diff --git a/sandbox/11+22 b/sandbox/11+22
deleted file mode 100644
index 8201379..0000000
--- a/sandbox/11+22
+++ /dev/null
@@ -1,1758 +0,0 @@
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diff --git a/sandbox/21+71 b/sandbox/21+71
deleted file mode 100644
index 830a159..0000000
--- a/sandbox/21+71
+++ /dev/null
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--0.3172101603478277 0.9793981696314312 -0.03251060588035003
--0.2508842317572536 0.9860477998281274 0.1602087348108135
--0.1747243955043576 0.9540473205849936 0.3466483747260775
--0.09171588821418675 0.8846510544866852 0.5195004404662992
-ARC 8 0 0 0
--0.06564989147689283 0.6332299327063173 -0.8096974398340563
--0.08903035314619645 0.4240463720411295 -0.9344293823384513
--0.1073871778604917 0.1909355219747087 -1.006435104951832
--0.2284140441086016 0.02683005435418514 -1.003995603893416
--0.300412574905965 -0.1688669504122406 -0.9706370268523851
--0.300412574905965 -0.1688669504122406 -0.9706370268523851
--0.4520543365160218 -0.1335249608327267 -0.9158154626733916
--0.592084883292754 -0.09475332379580997 -0.8374707747771575
-ARC 9 0 0 0
--0.7353603421863127 -0.1716709765639893 0.7004814365457482
--0.6252098180079688 -0.2837705037082616 0.7677805576410504
--0.4978342808888878 -0.3880519344986598 0.813926731901399
--0.5740669903007926 -0.2725148319154775 0.8106064131457812
--0.6399258711266592 -0.1520531783631428 0.7926378179297606
--0.6733122555204116 0.08243317926836041 0.7750841099659612
--0.6733122555204116 0.08243317926836041 0.7750841099659612
--0.7105575922332826 -0.04501301046517911 0.7442994941611217
--0.7353603421863127 -0.1716709765639893 0.7004814365457482
diff --git a/sandbox/801/Drivers/INPUT.DAT b/sandbox/801/Drivers/INPUT.DAT
deleted file mode 100644
index 67a08fd..0000000
--- a/sandbox/801/Drivers/INPUT.DAT
+++ /dev/null
@@ -1,345 +0,0 @@
-&PROBLEM  NEW_PROBLEM=.TRUE.
-TITLE='TWO QUADRICS, NO SOLUTIONS AT INFINITY, TWO REAL SOLUTIONS.'
-
-TRACKTOL = 1.0D-4  FINALTOL = 1.0D-14  SINGTOL = 0.0  SSPAR(5) = 1.0D0
-NUMRR = 1
-N = 2
-
-NUM_TERMS(1) = 6
-COEF(1,1) = (-9.80D-04,0.0)   DEG(1,1,1) = 2
-COEF(1,2) = ( 9.78D+05,0.0)   DEG(1,2,2) = 2
-COEF(1,3) = (-9.80D+00,0.0)   DEG(1,3,1) = 1 DEG(1,3,2) = 1
-COEF(1,4) = (-2.35D+02,0.0)   DEG(1,4,1) = 1
-COEF(1,5) = ( 8.89D+04,0.0)   DEG(1,5,2) = 1
-COEF(1,6) = (-1.00D+00,0.0)
-
-NUM_TERMS(2) = 6
-COEF(2,1) = (-1.00D-02,0.0)   DEG(2,1,1) = 2
-COEF(2,2) = (-9.84D-01,0.0)   DEG(2,2,2) = 2
-COEF(2,3) = (-2.97D+01,0.0)   DEG(2,3,1) = 1 DEG(2,3,2) = 1
-COEF(2,4) = ( 9.87D-03,0.0)   DEG(2,4,1) = 1
-COEF(2,5) = (-1.24D-01,0.0)   DEG(2,5,2) = 1
-COEF(2,6) = (-2.50D-01,0.0)                     /
-
-&SYSPARTITION  ROOT_COUNT_ONLY = .FALSE.
-P(1) = '{{x1,x2}}'
-P(2) = '{{x1,x2}}'
-
-NUM_SETS(1) = 1  NUM_INDICES(1,1) = 2
-INDEX(1,1,1) = 1 INDEX(1,1,2) = 2
-
-NUM_SETS(2) = 1  NUM_INDICES(2,1) = 2
-INDEX(2,1,1) = 1 INDEX(2,1,2) = 2   /
-
-&PROBLEM  NEW_PROBLEM = .TRUE.
-TITLE='PB803, 48 FINITE SOLUTIONS, TOTAL DEGREE 256.'
-
-TRACKTOL = 1.0D-06  FINALTOL = 1.0D-12  SINGTOL = 0.0  SSPAR(5) = 1.0D0
-NUMRR = 1
-N = 8
-
-DEG=27000*0
-
-NUM_TERMS(1) = 17
- DEG(  1,  1,  1) =   1
- DEG(  1,  1,  3) =   1
-COEF(  1,  1) =       (-0.290965281036386D-01, 0.D0)
- DEG(  1,  2,  1) =   1
- DEG(  1,  2,  4) =   1
-COEF(  1,  2) =        (0.123862737830566D+00, 0.D0)
- DEG(  1,  3,  2) =   1
- DEG(  1,  3,  3) =   1
-COEF(  1,  3) =        (0.215085387051146D-01, 0.D0)
- DEG(  1,  4,  2) =   1
- DEG(  1,  4,  4) =   1
-COEF(  1,  4) =        (0.167560227205193D+00, 0.D0)
- DEG(  1,  5,  5) =   1
- DEG(  1,  5,  7) =   1
-COEF(  1,  5) =        (0.000000000000000D+00, 0.D0)
- DEG(  1,  6,  5) =   1
- DEG(  1,  6,  8) =   1
-COEF(  1,  6) =       (-0.700449587631292D-01, 0.D0)
- DEG(  1,  7,  6) =   1
- DEG(  1,  7,  7) =   1
-COEF(  1,  7) =       (-0.270632938682637D+00, 0.D0)
- DEG(  1,  8,  6) =   1
- DEG(  1,  8,  8) =   1
-COEF(  1,  8) =        (0.000000000000000D+00, 0.D0)
- DEG(  1,  9,  1) =   1
-COEF(  1,  9) =       (-0.615842911676544D+00, 0.D0)
- DEG(  1,  10, 2) =   1
-COEF(  1,  10) =       (0.455239231804051D+00, 0.D0)
- DEG(  1,  11, 3) =   1
-COEF(  1,  11) =       (0.130935803481163D+00, 0.D0)
- DEG(  1,  12, 4) =   1
-COEF(  1,  12) =      (-0.129409522551260D+00, 0.D0)
- DEG(  1,  13, 5) =   1
-COEF(  1,  13) =       (0.418258151868904D+00, 0.D0)
- DEG(  1,  14, 6) =   1
-COEF(  1,  14) =      (-0.541265877365274D+00, 0.D0)
- DEG(  1,  15, 7) =   1
-COEF(  1,  15) =       (0.000000000000000D+00, 0.D0)
- DEG(  1,  16, 8) =   1
-COEF(  1,  16) =       (0.150925910357667D+00, 0.D0)
-COEF(  1,  17) =      (-0.238536449761034D-01, 0.D0)
-NUM_TERMS(2)=17
- DEG(  2,  1,  1) =   1
- DEG(  2,  1,  3) =   1
-COEF(  2,  1) =        (0.340782576514583D-01, 0.D0)
- DEG(  2,  2,  1) =   1
- DEG(  2,  2,  4) =   1
-COEF(  2,  2) =       (-0.156062186852569D+00, 0.D0)
- DEG(  2,  3,  2) =   1
- DEG(  2,  3,  3) =   1
-COEF(  2,  3) =       (-0.270999143496647D-01, 0.D0)
- DEG(  2,  4,  2) =   1
- DEG(  2,  4,  4) =   1
-COEF(  2,  4) =       (-0.196248864280182D+00, 0.D0)
- DEG(  2,  5,  5) =   1
- DEG(  2,  5,  7) =   1
-COEF(  2,  5) =        (0.220738619037920D+00, 0.D0)
- DEG(  2,  6,  5) =   1
- DEG(  2,  6,  8) =   1
-COEF(  2,  6) =        (0.000000000000000D+00, 0.D0)
- DEG(  2,  7,  6) =   1
- DEG(  2,  7,  7) =   1
-COEF(  2,  7) =        (0.000000000000000D+00, 0.D0)
- DEG(  2,  8,  6) =   1
- DEG(  2,  8,  8) =   1
-COEF(  2,  8) =       (-0.852868531952443D+00, 0.D0)
- DEG(  2,  9,  1) =   1
-COEF(  2,  9) =        (0.721283767677873D+00, 0.D0)
- DEG(  2,  10, 2) =   1
-COEF(  2,  10) =      (-0.573583559517377D+00, 0.D0)
- DEG(  2,  11, 3) =   1
-COEF(  2,  11) =       (0.631988450754851D-01, 0.D0)
- DEG(  2,  12, 4) =   1
-COEF(  2,  12) =       (0.000000000000000D+00, 0.D0)
- DEG(  2,  13, 5) =   1
-COEF(  2,  13) =      (-0.145259531732747D+00, 0.D0)
- DEG(  2,  14, 6) =   1
-COEF(  2,  14) =       (0.000000000000000D+00, 0.D0)
- DEG(  2,  15, 7) =   1
-COEF(  2,  15) =      (-0.475625621282099D+00, 0.D0)
- DEG(  2,  16, 8) =   1
-COEF(  2,  16) =       (0.000000000000000D+00, 0.D0)
-COEF(  2,  17) =       (0.191169832725054D-01, 0.D0)
-NUM_TERMS(3)=17
- DEG(  3,  1,  1) =   1
- DEG(  3,  1,  3) =   1
-COEF(  3,  1) =       (-0.602977987152187D+00, 0.D0)
- DEG(  3,  2,  1) =   1
- DEG(  3,  2,  4) =   1
-COEF(  3,  2) =       (-0.131668276721907D+00, 0.D0)
- DEG(  3,  3,  2) =   1
- DEG(  3,  3,  3) =   1
-COEF(  3,  3) =       (-0.758247385552503D+00, 0.D0)
- DEG(  3,  4,  2) =   1
- DEG(  3,  4,  4) =   1
-COEF(  3,  4) =        (0.104706028642251D+00, 0.D0)
- DEG(  3,  5,  5) =   1
- DEG(  3,  5,  7) =   1
-COEF(  3,  5) =       (-0.551846547594801D-01, 0.D0)
- DEG(  3,  6,  5) =   1
- DEG(  3,  6,  8) =   1
-COEF(  3,  6) =        (0.123100969126526D+00, 0.D0)
- DEG(  3,  7,  6) =   1
- DEG(  3,  7,  7) =   1
-COEF(  3,  7) =        (0.318608752805224D-01, 0.D0)
- DEG(  3,  8,  6) =   1
- DEG(  3,  8,  8) =   1
-COEF(  3,  8) =        (0.213217132988111D+00, 0.D0)
- DEG(  3,  9,  1) =   1
-COEF(  3,  9) =       (-0.214660295785905D-01, 0.D0)
- DEG(  3,  10, 2) =   1
-COEF(  3,  10) =      (-0.601805216517440D+00, 0.D0)
- DEG(  3,  11, 3) =   1
-COEF(  3,  11) =       (0.000000000000000D+00, 0.D0)
- DEG(  3,  12, 4) =   1
-COEF(  3,  12) =       (0.244181586600211D+00, 0.D0)
- DEG(  3,  13, 5) =   1
-COEF(  3,  13) =       (0.363148829331866D-01, 0.D0)
- DEG(  3,  14, 6) =   1
-COEF(  3,  14) =      (-0.209664074370650D-01, 0.D0)
- DEG(  3,  15, 7) =   1
-COEF(  3,  15) =      (-0.713438431923148D+00, 0.D0)
- DEG(  3,  16, 8) =   1
-COEF(  3,  16) =       (0.615504845632630D+00, 0.D0)
-COEF(  3,  17) =       (0.547700898171009D+00, 0.D0)
-NUM_TERMS(4)=17
- DEG(  4,  1,  1) =   1
- DEG(  4,  1,  3) =   1
-COEF(  4,  1) =        (0.478568869541663D+00, 0.D0)
- DEG(  4,  2,  1) =   1
- DEG(  4,  2,  4) =   1
-COEF(  4,  2) =        (0.112420351802601D+00, 0.D0)
- DEG(  4,  3,  2) =   1
- DEG(  4,  3,  3) =   1
-COEF(  4,  3) =        (0.647403003665440D+00, 0.D0)
- DEG(  4,  4,  2) =   1
- DEG(  4,  4,  4) =   1
-COEF(  4,  4) =       (-0.831026120840329D-01, 0.D0)
- DEG(  4,  5,  5) =   1
- DEG(  4,  5,  7) =   1
-COEF(  4,  5) =        (0.390625000000000D-01, 0.D0)
- DEG(  4,  6,  5) =   1
- DEG(  4,  6,  8) =   1
-COEF(  4,  6) =        (0.175112396907823D-01, 0.D0)
- DEG(  4,  7,  6) =   1
- DEG(  4,  7,  7) =   1
-COEF(  4,  7) =        (0.676582346706593D-01, 0.D0)
- DEG(  4,  8,  6) =   1
- DEG(  4,  8,  8) =   1
-COEF(  4,  8) =       (-0.101101189493172D-01, 0.D0)
- DEG(  4,  9,  1) =   1
-COEF(  4,  9) =        (0.196623270912993D-03, 0.D0)
- DEG(  4,  10, 2) =   1
-COEF(  4,  10) =       (0.500438376735814D+00, 0.D0)
- DEG(  4,  11, 3) =   1
-COEF(  4,  11) =      (-0.500000000000000D+00, 0.D0)
- DEG(  4,  12, 4) =   1
-COEF(  4,  12) =       (0.505897096673464D+00, 0.D0)
- DEG(  4,  13, 5) =   1
-COEF(  4,  13) =      (-0.264395379672260D-01, 0.D0)
- DEG(  4,  14, 6) =   1
-COEF(  4,  14) =       (0.195686833484385D+00, 0.D0)
- DEG(  4,  15, 7) =   1
-COEF(  4,  15) =       (0.195312500000000D+00, 0.D0)
- DEG(  4,  16, 8) =   1
-COEF(  4,  16) =       (0.226388865536500D+00, 0.D0)
-COEF(  4,  17) =      (-0.339187450014371D+00, 0.D0)
-NUM_TERMS(5)=3
- DEG(  5,  1,  1) =   2
-COEF(  5,  1) =        (0.100000000000000D+01, 0.D0)
- DEG(  5,  2,  2) =   2
-COEF(  5,  2) =        (0.100000000000000D+01, 0.D0)
-COEF(  5,  3) =       (-0.100000000000000D+01, 0.D0)
-NUM_TERMS(6)=3
- DEG(  6,  1,  3) =   2
-COEF(  6,  1) =        (0.100000000000000D+01, 0.D0)
- DEG(  6,  2,  4) =   2
-COEF(  6,  2) =        (0.100000000000000D+01, 0.D0)
-COEF(  6,  3) =       (-0.100000000000000D+01, 0.D0)
-NUM_TERMS(7)=3
- DEG(  7,  1,  5) =   2
-COEF(  7,  1) =        (0.100000000000000D+01, 0.D0)
- DEG(  7,  2,  6) =   2
-COEF(  7,  2) =        (0.100000000000000D+01, 0.D0)
-COEF(  7,  3) =       (-0.100000000000000D+01, 0.D0)
-NUM_TERMS(8)=3
- DEG(  8,  1,  7) =   2
-COEF(  8,  1) =        (0.100000000000000D+01, 0.D0)
- DEG(  8,  2,  8) =   2
-COEF(  8,  2) =        (0.100000000000000D+01, 0.D0)
-COEF(  8,  3) =       (-0.100000000000000D+01, 0.D0) /
-
-
-&SYSPARTITION ROOT_COUNT_ONLY = .TRUE.
-P(1) = '{{1,2,3,4,5,6,7,8}}'
-P(2) = '{{1,2,3,4,5,6,7,8}}'
-P(3) = '{{1,2,3,4,5,6,7,8}}'
-P(4) = '{{1,2,3,4,5,6,7,8}}'
-P(5) = '{{1,2,3,4,5,6,7,8}}'
-P(6) = '{{1,2,3,4,5,6,7,8}}'
-P(7) = '{{1,2,3,4,5,6,7,8}}'
-P(8) = '{{1,2,3,4,5,6,7,8}}'
-
-NUM_SETS(1) = 1
-NUM_INDICES(1,1) = 8
-INDEX(1,1,1) = 1 INDEX(1,1,2) = 2 INDEX(1,1,3) = 3 INDEX(1,1,4) = 4
-INDEX(1,1,5) = 5 INDEX(1,1,6) = 6 INDEX(1,1,7) = 7 INDEX(1,1,8) = 8
-
-NUM_SETS(2) = 1
-NUM_INDICES(2,1) = 8
-INDEX(2,1,1) = 1 INDEX(2,1,2) = 2 INDEX(2,1,3) = 3 INDEX(2,1,4) = 4
-INDEX(2,1,5) = 5 INDEX(2,1,6) = 6 INDEX(2,1,7) = 7 INDEX(2,1,8) = 8
-
-NUM_SETS(3) = 1
-NUM_INDICES(3,1) = 8
-INDEX(3,1,1) = 1 INDEX(3,1,2) = 2 INDEX(3,1,3) = 3 INDEX(3,1,4) = 4
-INDEX(3,1,5) = 5 INDEX(3,1,6) = 6 INDEX(3,1,7) = 7 INDEX(3,1,8) = 8
-
-NUM_SETS(4) = 1
-NUM_INDICES(4,1) = 8
-INDEX(4,1,1) = 1 INDEX(4,1,2) = 2 INDEX(4,1,3) = 3 INDEX(4,1,4) = 4
-INDEX(4,1,5) = 5 INDEX(4,1,6) = 6 INDEX(4,1,7) = 7 INDEX(4,1,8) = 8
-
-NUM_SETS(5) = 1
-NUM_INDICES(5,1) = 8
-INDEX(5,1,1) = 1 INDEX(5,1,2) = 2 INDEX(5,1,3) = 3 INDEX(5,1,4) = 4
-INDEX(5,1,5) = 5 INDEX(5,1,6) = 6 INDEX(5,1,7) = 7 INDEX(5,1,8) = 8
-
-NUM_SETS(6) = 1
-NUM_INDICES(6,1) = 8
-INDEX(6,1,1) = 1 INDEX(6,1,2) = 2 INDEX(6,1,3) = 3 INDEX(6,1,4) = 4
-INDEX(6,1,5) = 5 INDEX(6,1,6) = 6 INDEX(6,1,7) = 7 INDEX(6,1,8) = 8
-
-NUM_SETS(7) = 1
-NUM_INDICES(7,1) = 8
-INDEX(7,1,1) = 1 INDEX(7,1,2) = 2 INDEX(7,1,3) = 3 INDEX(7,1,4) = 4
-INDEX(7,1,5) = 5 INDEX(7,1,6) = 6 INDEX(7,1,7) = 7 INDEX(7,1,8) = 8
-
-NUM_SETS(8) = 1
-NUM_INDICES(8,1) = 8
-INDEX(8,1,1) = 1 INDEX(8,1,2) = 2 INDEX(8,1,3) = 3 INDEX(8,1,4) = 4
-INDEX(8,1,5) = 5 INDEX(8,1,6) = 6 INDEX(8,1,7) = 7 INDEX(8,1,8) = 8 /
-
-&PROBLEM  NEW_PROBLEM = .FALSE. /
-
-&SYSPARTITION  ROOT_COUNT_ONLY = .FALSE.
-P(1) = '{{1,2,5,6},{3,4,7,8}}'
-P(2) = '{{1,2,5,6},{3,4,7,8}}'
-P(3) = '{{1,2,5,6},{3,4,7,8}}'
-P(4) = '{{1,2,5,6},{3,4,7,8}}'
-P(5) = '{{1,2,5,6},{3,4,7,8}}'
-P(6) = '{{1,2,5,6},{3,4,7,8}}'
-P(7) = '{{1,2,5,6},{3,4,7,8}}'
-P(8) = '{{1,2,5,6},{3,4,7,8}}'
-
-NUM_SETS(1) = 2
-NUM_INDICES(1,1) = 4
-INDEX(1,1,1) = 1  INDEX(1,1,2) = 2  INDEX(1,1,3) = 5  INDEX(1,1,4) = 6
-NUM_INDICES(1,2) = 4
-INDEX(1,2,1) = 3  INDEX(1,2,2) = 4  INDEX(1,2,3) = 7  INDEX(1,2,4) = 8
-
-NUM_SETS(2) = 2
-NUM_INDICES(2,1) = 4
-INDEX(2,1,1) = 1  INDEX(2,1,2) = 2  INDEX(2,1,3) = 5  INDEX(2,1,4) = 6
-NUM_INDICES(2,2) = 4
-INDEX(2,2,1) = 3  INDEX(2,2,2) = 4  INDEX(2,2,3) = 7  INDEX(2,2,4) = 8
-
-NUM_SETS(3) = 2
-NUM_INDICES(3,1) = 4
-INDEX(3,1,1) = 1  INDEX(3,1,2) = 2  INDEX(3,1,3) = 5  INDEX(3,1,4) = 6
-NUM_INDICES(3,2) = 4
-INDEX(3,2,1) = 3  INDEX(3,2,2) = 4  INDEX(3,2,3) = 7  INDEX(3,2,4) = 8
-
-NUM_SETS(4) = 2
-NUM_INDICES(4,1) = 4
-INDEX(4,1,1) = 1  INDEX(4,1,2) = 2  INDEX(4,1,3) = 5  INDEX(4,1,4) = 6
-NUM_INDICES(4,2) = 4
-INDEX(4,2,1) = 3  INDEX(4,2,2) = 4  INDEX(4,2,3) = 7  INDEX(4,2,4) = 8
-
-NUM_SETS(5) = 2
-NUM_INDICES(5,1) = 4
-INDEX(5,1,1) = 1  INDEX(5,1,2) = 2  INDEX(5,1,3) = 5  INDEX(5,1,4) = 6
-NUM_INDICES(5,2) = 4
-INDEX(5,2,1) = 3  INDEX(5,2,2) = 4  INDEX(5,2,3) = 7  INDEX(5,2,4) = 8
-
-NUM_SETS(6) = 2
-NUM_INDICES(6,1) = 4
-INDEX(6,1,1) = 1  INDEX(6,1,2) = 2  INDEX(6,1,3) = 5  INDEX(6,1,4) = 6
-NUM_INDICES(6,2) = 4
-INDEX(6,2,1) = 3  INDEX(6,2,2) = 4  INDEX(6,2,3) = 7  INDEX(6,2,4) = 8
-
-NUM_SETS(7) = 2
-NUM_INDICES(7,1) = 4
-INDEX(7,1,1) = 1  INDEX(7,1,2) = 2  INDEX(7,1,3) = 5  INDEX(7,1,4) = 6
-NUM_INDICES(7,2) = 4
-INDEX(7,2,1) = 3  INDEX(7,2,2) = 4  INDEX(7,2,3) = 7  INDEX(7,2,4) = 8
-
-NUM_SETS(8) = 2
-NUM_INDICES(8,1) = 4
-INDEX(8,1,1) = 1  INDEX(8,1,2) = 2  INDEX(8,1,3) = 5  INDEX(8,1,4) = 6
-NUM_INDICES(8,2) = 4
-INDEX(8,2,1) = 3  INDEX(8,2,2) = 4  INDEX(8,2,3) = 7  INDEX(8,2,4) = 8 /
diff --git a/sandbox/801/Drivers/OUTPUT.DAT b/sandbox/801/Drivers/OUTPUT.DAT
deleted file mode 100644
index 8d31f72..0000000
--- a/sandbox/801/Drivers/OUTPUT.DAT
+++ /dev/null
@@ -1,2746 +0,0 @@
-
-
-
-TWO QUADRICS, NO SOLUTIONS AT INFINITY, TWO REAL SOLUTIONS.                     
-
-TRACKTOL, FINALTOL =  1.00000000000000E-04  1.00000000000000E-14
-SINGTOL (0 SETS DEFAULT) =  0.00000000000000E+00
-SSPAR(5) (0 SETS DEFAULT) =  1.00000000000000E+00
-NUMBER OF EQUATIONS =  2
-
-****** COEFFICIENT TABLEAU ******
-
-POLYNOMIAL( 1)%NUM_TERMS =  6
-POLYNOMIAL( 1)%TERM( 1)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 1)%COEF = ( -9.80000000000000E-04,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 2)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 2)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM( 2)%COEF = (  9.78000000000000E+05,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 3)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM( 3)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM( 3)%COEF = ( -9.80000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 4)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM( 4)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 4)%COEF = ( -2.35000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 5)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM( 5)%COEF = (  8.89000000000000E+04,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 6)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-
-POLYNOMIAL( 2)%NUM_TERMS =  6
-POLYNOMIAL( 2)%TERM( 1)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 1)%COEF = ( -1.00000000000000E-02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 2)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 2)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM( 2)%COEF = ( -9.84000000000000E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 3)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM( 3)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM( 3)%COEF = ( -2.97000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 4)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM( 4)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 4)%COEF = (  9.87000000000000E-03,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 5)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM( 5)%COEF = ( -1.24000000000000E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 6)%COEF = ( -2.50000000000000E-01,  0.00000000000000E+00)
-
-
-GENERALIZED PLP BEZOUT NUMBER (BPLP) =         4
-BASED ON THE FOLLOWING SYSTEM PARTITION:
-P( 1) = {{x1,x2}}
-P( 2) = {{x1,x2}}
-
-PATH NUMBER =         1
-
-ARCLEN =  2.11950670930887E+00
-NFE =   84
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.68799918593818E-19
-
-X( 1) = (  9.08921229615391E-02, -2.98865809376575E-17)
-X( 2) = ( -9.11497098197500E-02,  1.20137022371327E-17)
-
-X( 3) = (  1.01944900175121E-01, -1.38574160472079E-01)
-
-PATH NUMBER =         2
-
-ARCLEN =  3.70165746698696E+00
-NFE =   70
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.04154627018796E-17
-
-X( 1) = (  2.34233851959128E+03,  1.06173882318754E-11)
-X( 2) = ( -7.88344824094143E-01, -3.58050227858983E-15)
-
-X( 3) = ( -4.40720621950994E-03, -8.44145808945829E-04)
-
-PATH NUMBER =         3
-
-ARCLEN =  1.81027677745590E+00
-NFE =   58
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.21581437507446E-16
-
-X( 1) = (  1.61478579234411E-02,  1.68496955498882E+00)
-X( 2) = (  2.67994739614473E-04,  4.42802993973665E-03)
-
-X( 3) = (  5.14942892898713E-01,  2.20408986637253E-02)
-
-PATH NUMBER =         4
-
-ARCLEN =  1.24184999780463E+01
-NFE =   93
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.78189200409891E-15
-
-X( 1) = (  1.61478579234122E-02, -1.68496955498883E+00)
-X( 2) = (  2.67994739614405E-04, -4.42802993973668E-03)
-
-X( 3) = (  6.15563618923964E-01, -1.73167425520720E-01)
-
-
-
-PB803, 48 FINITE SOLUTIONS, TOTAL DEGREE 256.                                   
-
-TRACKTOL, FINALTOL =  1.00000000000000E-06  1.00000000000000E-12
-SINGTOL (0 SETS DEFAULT) =  0.00000000000000E+00
-SSPAR(5) (0 SETS DEFAULT) =  1.00000000000000E+00
-NUMBER OF EQUATIONS =  8
-
-****** COEFFICIENT TABLEAU ******
-
-POLYNOMIAL( 1)%NUM_TERMS = 17
-POLYNOMIAL( 1)%TERM( 1)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM( 1)%COEF = ( -2.90965281036386E-02,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 2)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM( 2)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM( 2)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM( 2)%COEF = (  1.23862737830566E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 3)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM( 3)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM( 3)%COEF = (  2.15085387051146E-02,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 4)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 4)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM( 4)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM( 4)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM( 4)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM( 4)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM( 4)%COEF = (  1.67560227205193E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 5)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 5) = 1
-POLYNOMIAL( 1)%TERM( 5)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 7) = 1
-POLYNOMIAL( 1)%TERM( 5)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM( 5)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 5) = 1
-POLYNOMIAL( 1)%TERM( 6)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 8) = 1
-POLYNOMIAL( 1)%TERM( 6)%COEF = ( -7.00449587631292E-02,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 7)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 7)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM( 7)%DEG( 6) = 1
-POLYNOMIAL( 1)%TERM( 7)%DEG( 7) = 1
-POLYNOMIAL( 1)%TERM( 7)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM( 7)%COEF = ( -2.70632938682637E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 6) = 1
-POLYNOMIAL( 1)%TERM( 8)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 8) = 1
-POLYNOMIAL( 1)%TERM( 8)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 9)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM( 9)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM( 9)%COEF = ( -6.15842911676544E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(10)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM(10)%COEF = (  4.55239231804051E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(11)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM(11)%COEF = (  1.30935803481163E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(12)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(12)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(12)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(12)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM(12)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM(12)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM(12)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM(12)%COEF = ( -1.29409522551260E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(13)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(13)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(13)%DEG( 5) = 1
-POLYNOMIAL( 1)%TERM(13)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM(13)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM(13)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM(13)%COEF = (  4.18258151868904E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(14)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(14)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(14)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM(14)%DEG( 6) = 1
-POLYNOMIAL( 1)%TERM(14)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM(14)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM(14)%COEF = ( -5.41265877365274E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(15)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(15)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(15)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM(15)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM(15)%DEG( 7) = 1
-POLYNOMIAL( 1)%TERM(15)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM(15)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(16)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 8) = 1
-POLYNOMIAL( 1)%TERM(16)%COEF = (  1.50925910357667E-01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(17)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(17)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(17)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(17)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(17)%DEG( 5) = 0
-POLYNOMIAL( 1)%TERM(17)%DEG( 6) = 0
-POLYNOMIAL( 1)%TERM(17)%DEG( 7) = 0
-POLYNOMIAL( 1)%TERM(17)%DEG( 8) = 0
-POLYNOMIAL( 1)%TERM(17)%COEF = ( -2.38536449761034E-02,  0.00000000000000E+00)
-
-POLYNOMIAL( 2)%NUM_TERMS = 17
-POLYNOMIAL( 2)%TERM( 1)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM( 1)%COEF = (  3.40782576514583E-02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 2)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM( 2)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM( 2)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM( 2)%COEF = ( -1.56062186852569E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 3)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM( 3)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM( 3)%COEF = ( -2.70999143496647E-02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 4)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 4)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM( 4)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM( 4)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM( 4)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM( 4)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM( 4)%COEF = ( -1.96248864280182E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 5)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 5) = 1
-POLYNOMIAL( 2)%TERM( 5)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 7) = 1
-POLYNOMIAL( 2)%TERM( 5)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM( 5)%COEF = (  2.20738619037920E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 5) = 1
-POLYNOMIAL( 2)%TERM( 6)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 8) = 1
-POLYNOMIAL( 2)%TERM( 6)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 7)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 7)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM( 7)%DEG( 6) = 1
-POLYNOMIAL( 2)%TERM( 7)%DEG( 7) = 1
-POLYNOMIAL( 2)%TERM( 7)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM( 7)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 6) = 1
-POLYNOMIAL( 2)%TERM( 8)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 8) = 1
-POLYNOMIAL( 2)%TERM( 8)%COEF = ( -8.52868531952443E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 9)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM( 9)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM( 9)%COEF = (  7.21283767677873E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(10)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM(10)%COEF = ( -5.73583559517377E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(11)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM(11)%COEF = (  6.31988450754851E-02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(12)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(12)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(12)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(12)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM(12)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM(12)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM(12)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM(12)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(13)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(13)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(13)%DEG( 5) = 1
-POLYNOMIAL( 2)%TERM(13)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM(13)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM(13)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM(13)%COEF = ( -1.45259531732747E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(14)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(14)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(14)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM(14)%DEG( 6) = 1
-POLYNOMIAL( 2)%TERM(14)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM(14)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM(14)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(15)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(15)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(15)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM(15)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM(15)%DEG( 7) = 1
-POLYNOMIAL( 2)%TERM(15)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM(15)%COEF = ( -4.75625621282099E-01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(16)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 8) = 1
-POLYNOMIAL( 2)%TERM(16)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(17)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(17)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(17)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(17)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(17)%DEG( 5) = 0
-POLYNOMIAL( 2)%TERM(17)%DEG( 6) = 0
-POLYNOMIAL( 2)%TERM(17)%DEG( 7) = 0
-POLYNOMIAL( 2)%TERM(17)%DEG( 8) = 0
-POLYNOMIAL( 2)%TERM(17)%COEF = (  1.91169832725054E-02,  0.00000000000000E+00)
-
-POLYNOMIAL( 3)%NUM_TERMS = 17
-POLYNOMIAL( 3)%TERM( 1)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM( 1)%COEF = ( -6.02977987152187E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 2)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM( 2)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM( 2)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM( 2)%COEF = ( -1.31668276721907E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 3)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM( 3)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM( 3)%COEF = ( -7.58247385552503E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 4)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 4)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM( 4)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM( 4)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM( 4)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM( 4)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM( 4)%COEF = (  1.04706028642251E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 5)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 5)%DEG( 5) = 1
-POLYNOMIAL( 3)%TERM( 5)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM( 5)%DEG( 7) = 1
-POLYNOMIAL( 3)%TERM( 5)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM( 5)%COEF = ( -5.51846547594801E-02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 5) = 1
-POLYNOMIAL( 3)%TERM( 6)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 8) = 1
-POLYNOMIAL( 3)%TERM( 6)%COEF = (  1.23100969126526E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 7)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 7)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM( 7)%DEG( 6) = 1
-POLYNOMIAL( 3)%TERM( 7)%DEG( 7) = 1
-POLYNOMIAL( 3)%TERM( 7)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM( 7)%COEF = (  3.18608752805224E-02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 6) = 1
-POLYNOMIAL( 3)%TERM( 8)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 8) = 1
-POLYNOMIAL( 3)%TERM( 8)%COEF = (  2.13217132988111E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 9)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM( 9)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM( 9)%COEF = ( -2.14660295785905E-02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(10)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM(10)%COEF = ( -6.01805216517440E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(11)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM(11)%COEF = (  0.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(12)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(12)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(12)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(12)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM(12)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM(12)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM(12)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM(12)%COEF = (  2.44181586600211E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(13)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(13)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(13)%DEG( 5) = 1
-POLYNOMIAL( 3)%TERM(13)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM(13)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM(13)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM(13)%COEF = (  3.63148829331866E-02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(14)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(14)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(14)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM(14)%DEG( 6) = 1
-POLYNOMIAL( 3)%TERM(14)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM(14)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM(14)%COEF = ( -2.09664074370650E-02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(15)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(15)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(15)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM(15)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM(15)%DEG( 7) = 1
-POLYNOMIAL( 3)%TERM(15)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM(15)%COEF = ( -7.13438431923148E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(16)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 8) = 1
-POLYNOMIAL( 3)%TERM(16)%COEF = (  6.15504845632630E-01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(17)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(17)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(17)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(17)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(17)%DEG( 5) = 0
-POLYNOMIAL( 3)%TERM(17)%DEG( 6) = 0
-POLYNOMIAL( 3)%TERM(17)%DEG( 7) = 0
-POLYNOMIAL( 3)%TERM(17)%DEG( 8) = 0
-POLYNOMIAL( 3)%TERM(17)%COEF = (  5.47700898171009E-01,  0.00000000000000E+00)
-
-POLYNOMIAL( 4)%NUM_TERMS = 17
-POLYNOMIAL( 4)%TERM( 1)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM( 1)%COEF = (  4.78568869541663E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 2)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM( 2)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM( 2)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM( 2)%COEF = (  1.12420351802601E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 3)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM( 3)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM( 3)%COEF = (  6.47403003665440E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 4)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 4)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM( 4)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM( 4)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM( 4)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM( 4)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM( 4)%COEF = ( -8.31026120840329E-02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 5)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 5)%DEG( 5) = 1
-POLYNOMIAL( 4)%TERM( 5)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM( 5)%DEG( 7) = 1
-POLYNOMIAL( 4)%TERM( 5)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM( 5)%COEF = (  3.90625000000000E-02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 5) = 1
-POLYNOMIAL( 4)%TERM( 6)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 8) = 1
-POLYNOMIAL( 4)%TERM( 6)%COEF = (  1.75112396907823E-02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 7)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 7)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM( 7)%DEG( 6) = 1
-POLYNOMIAL( 4)%TERM( 7)%DEG( 7) = 1
-POLYNOMIAL( 4)%TERM( 7)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM( 7)%COEF = (  6.76582346706593E-02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 6) = 1
-POLYNOMIAL( 4)%TERM( 8)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 8) = 1
-POLYNOMIAL( 4)%TERM( 8)%COEF = ( -1.01101189493172E-02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 9)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM( 9)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM( 9)%COEF = (  1.96623270912993E-04,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(10)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM(10)%COEF = (  5.00438376735814E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(11)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM(11)%COEF = ( -5.00000000000000E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(12)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(12)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(12)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(12)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM(12)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM(12)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM(12)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM(12)%COEF = (  5.05897096673464E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(13)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(13)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(13)%DEG( 5) = 1
-POLYNOMIAL( 4)%TERM(13)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM(13)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM(13)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM(13)%COEF = ( -2.64395379672260E-02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(14)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(14)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(14)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM(14)%DEG( 6) = 1
-POLYNOMIAL( 4)%TERM(14)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM(14)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM(14)%COEF = (  1.95686833484385E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(15)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(15)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(15)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM(15)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM(15)%DEG( 7) = 1
-POLYNOMIAL( 4)%TERM(15)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM(15)%COEF = (  1.95312500000000E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(16)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 8) = 1
-POLYNOMIAL( 4)%TERM(16)%COEF = (  2.26388865536500E-01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(17)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(17)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(17)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(17)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(17)%DEG( 5) = 0
-POLYNOMIAL( 4)%TERM(17)%DEG( 6) = 0
-POLYNOMIAL( 4)%TERM(17)%DEG( 7) = 0
-POLYNOMIAL( 4)%TERM(17)%DEG( 8) = 0
-POLYNOMIAL( 4)%TERM(17)%COEF = ( -3.39187450014371E-01,  0.00000000000000E+00)
-
-POLYNOMIAL( 5)%NUM_TERMS =  3
-POLYNOMIAL( 5)%TERM( 1)%DEG( 1) = 2
-POLYNOMIAL( 5)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 5)%TERM( 1)%DEG( 3) = 0
-POLYNOMIAL( 5)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 5)%TERM( 1)%DEG( 5) = 0
-POLYNOMIAL( 5)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 5)%TERM( 1)%DEG( 7) = 0
-POLYNOMIAL( 5)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 5)%TERM( 1)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 5)%TERM( 2)%DEG( 1) = 0
-POLYNOMIAL( 5)%TERM( 2)%DEG( 2) = 2
-POLYNOMIAL( 5)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 5)%TERM( 2)%DEG( 4) = 0
-POLYNOMIAL( 5)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 5)%TERM( 2)%DEG( 6) = 0
-POLYNOMIAL( 5)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 5)%TERM( 2)%DEG( 8) = 0
-POLYNOMIAL( 5)%TERM( 2)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 5)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 5)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 5)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 5)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 5)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 5)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 5)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 5)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 5)%TERM( 3)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-
-POLYNOMIAL( 6)%NUM_TERMS =  3
-POLYNOMIAL( 6)%TERM( 1)%DEG( 1) = 0
-POLYNOMIAL( 6)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 6)%TERM( 1)%DEG( 3) = 2
-POLYNOMIAL( 6)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 6)%TERM( 1)%DEG( 5) = 0
-POLYNOMIAL( 6)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 6)%TERM( 1)%DEG( 7) = 0
-POLYNOMIAL( 6)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 6)%TERM( 1)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 6)%TERM( 2)%DEG( 1) = 0
-POLYNOMIAL( 6)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 6)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 6)%TERM( 2)%DEG( 4) = 2
-POLYNOMIAL( 6)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 6)%TERM( 2)%DEG( 6) = 0
-POLYNOMIAL( 6)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 6)%TERM( 2)%DEG( 8) = 0
-POLYNOMIAL( 6)%TERM( 2)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 6)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 6)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 6)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 6)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 6)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 6)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 6)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 6)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 6)%TERM( 3)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-
-POLYNOMIAL( 7)%NUM_TERMS =  3
-POLYNOMIAL( 7)%TERM( 1)%DEG( 1) = 0
-POLYNOMIAL( 7)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 7)%TERM( 1)%DEG( 3) = 0
-POLYNOMIAL( 7)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 7)%TERM( 1)%DEG( 5) = 2
-POLYNOMIAL( 7)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 7)%TERM( 1)%DEG( 7) = 0
-POLYNOMIAL( 7)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 7)%TERM( 1)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 7)%TERM( 2)%DEG( 1) = 0
-POLYNOMIAL( 7)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 7)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 7)%TERM( 2)%DEG( 4) = 0
-POLYNOMIAL( 7)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 7)%TERM( 2)%DEG( 6) = 2
-POLYNOMIAL( 7)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 7)%TERM( 2)%DEG( 8) = 0
-POLYNOMIAL( 7)%TERM( 2)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 7)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 7)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 7)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 7)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 7)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 7)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 7)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 7)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 7)%TERM( 3)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-
-POLYNOMIAL( 8)%NUM_TERMS =  3
-POLYNOMIAL( 8)%TERM( 1)%DEG( 1) = 0
-POLYNOMIAL( 8)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 8)%TERM( 1)%DEG( 3) = 0
-POLYNOMIAL( 8)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 8)%TERM( 1)%DEG( 5) = 0
-POLYNOMIAL( 8)%TERM( 1)%DEG( 6) = 0
-POLYNOMIAL( 8)%TERM( 1)%DEG( 7) = 2
-POLYNOMIAL( 8)%TERM( 1)%DEG( 8) = 0
-POLYNOMIAL( 8)%TERM( 1)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 8)%TERM( 2)%DEG( 1) = 0
-POLYNOMIAL( 8)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 8)%TERM( 2)%DEG( 3) = 0
-POLYNOMIAL( 8)%TERM( 2)%DEG( 4) = 0
-POLYNOMIAL( 8)%TERM( 2)%DEG( 5) = 0
-POLYNOMIAL( 8)%TERM( 2)%DEG( 6) = 0
-POLYNOMIAL( 8)%TERM( 2)%DEG( 7) = 0
-POLYNOMIAL( 8)%TERM( 2)%DEG( 8) = 2
-POLYNOMIAL( 8)%TERM( 2)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 8)%TERM( 3)%DEG( 1) = 0
-POLYNOMIAL( 8)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 8)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 8)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 8)%TERM( 3)%DEG( 5) = 0
-POLYNOMIAL( 8)%TERM( 3)%DEG( 6) = 0
-POLYNOMIAL( 8)%TERM( 3)%DEG( 7) = 0
-POLYNOMIAL( 8)%TERM( 3)%DEG( 8) = 0
-POLYNOMIAL( 8)%TERM( 3)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-
-
-GENERALIZED PLP BEZOUT NUMBER (BPLP) =       256
-BASED ON THE FOLLOWING SYSTEM PARTITION:
-P( 1) = {{1,2,3,4,5,6,7,8}}
-P( 2) = {{1,2,3,4,5,6,7,8}}
-P( 3) = {{1,2,3,4,5,6,7,8}}
-P( 4) = {{1,2,3,4,5,6,7,8}}
-P( 5) = {{1,2,3,4,5,6,7,8}}
-P( 6) = {{1,2,3,4,5,6,7,8}}
-P( 7) = {{1,2,3,4,5,6,7,8}}
-P( 8) = {{1,2,3,4,5,6,7,8}}
-
-
-GENERALIZED PLP BEZOUT NUMBER (BPLP) =        96
-BASED ON THE FOLLOWING SYSTEM PARTITION:
-P( 1) = {{1,2,5,6},{3,4,7,8}}
-P( 2) = {{1,2,5,6},{3,4,7,8}}
-P( 3) = {{1,2,5,6},{3,4,7,8}}
-P( 4) = {{1,2,5,6},{3,4,7,8}}
-P( 5) = {{1,2,5,6},{3,4,7,8}}
-P( 6) = {{1,2,5,6},{3,4,7,8}}
-P( 7) = {{1,2,5,6},{3,4,7,8}}
-P( 8) = {{1,2,5,6},{3,4,7,8}}
-
-PATH NUMBER =         1
-
-ARCLEN =  7.37657649611213E+01
-NFE =  339
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.50946419399949E-13
-
-X( 1) = (  1.52882796872246E+00,  5.93006252708964E-01)
-X( 2) = ( -7.34212672558503E-01,  1.23479827937258E+00)
-X( 3) = ( -6.27822700511951E-01, -2.57790977457424E-01)
-X( 4) = (  8.42157099175811E-01, -1.92181515531147E-01)
-X( 5) = (  1.34052542652357E+00,  1.04876828069950E+00)
-X( 6) = ( -1.25119464901067E+00,  1.12364654685883E+00)
-X( 7) = (  7.03035713465419E-01, -2.44536619573047E-01)
-X( 8) = ( -7.83389442654749E-01, -2.19454038373731E-01)
-
-X( 9) = (  3.16711703704289E-03, -1.48826490234122E+00)
-
-PATH NUMBER =         2
-
-ARCLEN =  4.98055987755029E+00
-NFE =   93
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.38802211470647E-17
-
-X( 1) = ( -7.82540497851945E-01,  1.54277295555059E-17)
-X( 2) = (  6.22599686172125E-01, -1.15184419589679E-16)
-X( 3) = ( -8.29709626974048E-01,  5.81970433673399E-17)
-X( 4) = ( -5.58195248015052E-01, -5.91504970707266E-17)
-X( 5) = ( -8.50226890899773E-01,  2.00532656788181E-16)
-X( 6) = (  5.26416407410431E-01,  1.90560676921052E-16)
-X( 7) = ( -7.55089439022002E-01, -4.24052359238972E-17)
-X( 8) = ( -6.55621795761427E-01,  2.34981504449443E-16)
-
-X( 9) = ( -1.35408675196957E-01,  7.23682258995581E-01)
-
-PATH NUMBER =         3
-
-ARCLEN =  6.28761519824485E+00
-NFE =  115
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.51376765951137E-14
-
-X( 1) = (  4.62425684005120E+13,  9.28690866000915E+12)
-X( 2) = ( -9.28690866000915E+12,  4.62425684005120E+13)
-X( 3) = ( -6.49904242261198E-01, -3.49424476320791E-01)
-X( 4) = (  9.72787797493214E-01, -2.56246615470206E-01)
-X( 5) = (  4.16389425879834E+13,  1.88553775876520E+13)
-X( 6) = ( -1.88553775876520E+13,  4.16389425879833E+13)
-X( 7) = (  6.13960230641984E-01, -6.53857034995862E-01)
-X( 8) = ( -1.12740177380355E+00, -3.25530022936429E-01)
-
-X( 9) = (  6.80084616822962E-15, -2.17972883666262E-14)
-
-PATH NUMBER =         4
-
-ARCLEN =  7.15990511332605E+00
-NFE =  194
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.52895188018363E-16
-
-X( 1) = (  6.17653599891831E-01, -6.36907669143255E-02)
-X( 2) = ( -7.90592480178199E-01, -4.97586714404813E-02)
-X( 3) = ( -8.96723890425265E-01, -6.96526650740075E-02)
-X( 4) = (  4.67530808227776E-01, -1.33593781852389E-01)
-X( 5) = (  4.08955073213476E-01, -5.09587694769522E-01)
-X( 6) = ( -1.06340978278925E+00, -1.95971935180568E-01)
-X( 7) = (  9.07104450970911E-01,  9.39529209909662E-02)
-X( 8) = ( -4.68117719657307E-01,  1.82059147162842E-01)
-
-X( 9) = ( -8.33894142062010E-01,  3.80435546865026E-01)
-
-PATH NUMBER =         5
-
-ARCLEN =  5.51606826606280E+01
-NFE =  276
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.18833772041956E-15
-
-X( 1) = (  5.06767098777125E+14, -3.11665606927147E+14)
-X( 2) = (  3.11665606927147E+14,  5.06767098777125E+14)
-X( 3) = ( -7.38828357892554E-01, -8.71514680117696E-01)
-X( 4) = ( -1.20406073825298E+00,  4.47024668535316E-01)
-X( 5) = (  8.82882325940256E+14, -3.79429190937506E+14)
-X( 6) = (  3.79429190937506E+14,  8.82882325940256E+14)
-X( 7) = ( -9.57664030388913E-01,  1.31682665693769E-01)
-X( 8) = ( -4.11819602325250E-01, -2.12472728771820E-01)
-
-X( 9) = (  1.82508495078990E-15, -3.35343731949767E-16)
-
-PATH NUMBER =         6
-
-ARCLEN =  6.58389284332875E+00
-NFE =  112
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.86617462648602E-13
-
-X( 1) = (  5.68733300138648E+13, -4.43513922884112E+13)
-X( 2) = (  4.43513922884109E+13,  5.68733300138651E+13)
-X( 3) = ( -4.34026267570458E-01, -5.08272464350485E-01)
-X( 4) = ( -1.04758002139782E+00, -5.37047428391781E-02)
-X( 5) = (  5.01504608968762E+12, -1.12803109788145E+14)
-X( 6) = ( -1.12803109788144E+14, -5.01504608968620E+12)
-X( 7) = ( -9.18582492566893E-01, -2.35170932488679E-02)
-X( 8) = ( -4.19631913041582E-01,  1.63044923837630E-01)
-
-X( 9) = (  2.23945346858670E-15,  2.72516384458577E-14)
-
-PATH NUMBER =         7
-
-ARCLEN =  1.39073313581584E+01
-NFE =  183
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.21611071994037E-12
-
-X( 1) = ( -4.25109596843695E+13, -1.21410633721387E+14)
-X( 2) = ( -1.21410633721387E+14,  4.25109596843692E+13)
-X( 3) = (  1.22572301003932E-01,  2.78881375496104E-01)
-X( 4) = (  1.75259478250095E-01,  3.55856294693715E+00)
-X( 5) = ( -6.02305798146588E+00,  6.54287483333290E+00)
-X( 6) = ( -1.73780667163294E+00, -1.98980706066334E+00)
-X( 7) = (  6.09372561076487E+13,  4.12962915502169E+13)
-X( 8) = (  4.12962915502168E+13, -6.09372561076487E+13)
-
-X( 9) = ( -1.85716242731560E-14,  3.04877650902924E-15)
-
-PATH NUMBER =         8
-
-ARCLEN =  1.23698351807243E+01
-NFE =  148
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.33425515010880E-17
-
-X( 1) = ( -3.23572566938692E-01,  2.97641964918430E-17)
-X( 2) = ( -9.46203357595346E-01, -1.59198903808476E-16)
-X( 3) = ( -7.82982639239781E-01,  3.75960801128431E-17)
-X( 4) = ( -6.22043556874523E-01,  1.43060594586847E-16)
-X( 5) = ( -8.67196525522176E-01,  6.21046325408636E-17)
-X( 6) = ( -4.97966049166272E-01,  6.12903125021688E-18)
-X( 7) = (  7.73321237566210E-01,  3.05292259439041E-18)
-X( 8) = (  6.34014403250482E-01, -6.21966446491147E-17)
-
-X( 9) = ( -5.68681413228234E-01, -7.66140290335769E-02)
-
-PATH NUMBER =         9
-
-ARCLEN =  1.75147666054740E+02
-NFE =  367
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.38805254641441E-13
-
-X( 1) = (  2.39405663642704E+14,  8.95193037994051E+13)
-X( 2) = ( -8.95193037994046E+13,  2.39405663642704E+14)
-X( 3) = ( -1.83224622588743E-01, -1.93316377773743E-01)
-X( 4) = (  4.45418525538837E-01, -2.00569587102323E+00)
-X( 5) = ( -5.49136056012692E+00,  7.19918426277906E+00)
-X( 6) = ( -2.75303430765812E+00, -2.85798296879748E+00)
-X( 7) = ( -2.15466498352322E+14, -1.13090149054140E+14)
-X( 8) = ( -1.13090149054140E+14,  2.15466498352322E+14)
-
-X( 9) = (  1.44732858510521E-15, -1.87783816274489E-15)
-
-PATH NUMBER =        10
-
-ARCLEN =  7.72418968599533E+01
-NFE =  350
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.63884477607343E-14
-
-X( 1) = (  3.92563146760268E+00,  1.97306127514505E+01)
-X( 2) = (  2.86179585404678E+00, -1.67830350784498E+01)
-X( 3) = ( -7.25138049185116E+14, -3.82630167758226E+14)
-X( 4) = (  3.82630167758226E+14, -7.25138049185116E+14)
-X( 5) = (  3.05415567711388E+15,  1.18174130316843E+16)
-X( 6) = ( -1.18174130316843E+16,  3.05415567711388E+15)
-X( 7) = ( -6.18541499189670E-01, -5.41583040614899E-01)
-X( 8) = ( -1.83286353606981E-01,  2.18746206281528E-01)
-
-X( 9) = (  1.70426417119354E-16, -7.93093889173146E-17)
-
-PATH NUMBER =        11
-
-ARCLEN =  8.06640579608604E+00
-NFE =  207
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.42524013928860E-13
-
-X( 1) = ( -8.28253379807921E-01,  5.66208311142201E-01)
-X( 2) = ( -9.39953195543356E-01, -4.98922658705095E-01)
-X( 3) = ( -2.88293160145128E-01, -1.92429259310170E-01)
-X( 4) = (  9.78330979423585E-01, -5.67047762339133E-02)
-X( 5) = (  1.28667055008968E+00,  7.48750669667126E-02)
-X( 6) = (  1.18237411569145E-01, -8.14797468276528E-01)
-X( 7) = (  4.88755859727842E-01,  1.68192955396492E-01)
-X( 8) = ( -8.93239162923500E-01,  9.20305511974229E-02)
-
-X( 9) = (  1.47939289436875E-02,  4.28158401011624E-01)
-
-PATH NUMBER =        12
-
-ARCLEN =  8.18082421085941E+00
-NFE =  145
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.96353789634158E-16
-
-X( 1) = ( -2.19892652069751E+15,  1.40609768288592E+15)
-X( 2) = (  1.40609768288592E+15,  2.19892652069751E+15)
-X( 3) = ( -3.73390654540535E-01,  3.54717796566222E-01)
-X( 4) = (  8.85444440562854E-01,  2.76040690005544E-01)
-X( 5) = ( -2.31679752440157E+15, -2.87660363323267E+15)
-X( 6) = (  2.87660363323267E+15, -2.31679752440157E+15)
-X( 7) = ( -8.17759105503399E-01, -1.72497427210410E-02)
-X( 8) = ( -2.68097675147299E-01, -2.24577071288384E-01)
-
-X( 9) = ( -3.92477798307964E-16,  3.48083107476471E-16)
-
-PATH NUMBER =        13
-
-ARCLEN =  3.46511901989518E+01
-NFE =  218
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.15357350181340E-12
-
-X( 1) = (  8.44314079219769E+00,  1.43117290092847E+01)
-X( 2) = ( -7.94855152251404E+00, -7.05971734241270E+00)
-X( 3) = ( -1.03521987833102E+14, -2.83085474124075E+13)
-X( 4) = ( -2.83085474124077E+13,  1.03521987833102E+14)
-X( 5) = ( -3.27802549315190E+14,  1.10208767777574E+15)
-X( 6) = ( -1.10208767777575E+15, -3.27802549315186E+14)
-X( 7) = ( -2.25503893203492E+00, -6.80421395714545E-01)
-X( 8) = ( -3.50268198145774E-01,  3.97877628371772E-01)
-
-X( 9) = (  5.63014329710461E-16, -1.23940571347680E-15)
-
-PATH NUMBER =        14
-
-ARCLEN =  9.53677897812604E+00
-NFE =  140
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.03272259791598E-13
-
-X( 1) = (  1.16231199225190E+00, -1.87679591182113E-01)
-X( 2) = (  3.33772014513861E-01,  6.53566596498551E-01)
-X( 3) = (  6.06760099173357E+00, -1.30472521573240E+00)
-X( 4) = ( -1.32197811553534E+00, -5.98841381705263E+00)
-X( 5) = ( -1.53635384798699E+00, -1.93378873592408E-01)
-X( 6) = (  2.52300382664579E-01, -1.17755816865435E+00)
-X( 7) = ( -5.91454538188651E+00,  7.03796500473896E-01)
-X( 8) = (  7.13926056315967E-01,  5.83062672224890E+00)
-
-X( 9) = ( -2.26474803139611E-03,  9.02678750863237E-02)
-
-PATH NUMBER =        15
-
-ARCLEN =  5.83027298169860E+01
-NFE =  239
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.58421540484717E-16
-
-X( 1) = (  6.17653599891829E-01,  6.36907669143178E-02)
-X( 2) = ( -7.90592480178201E-01,  4.97586714404780E-02)
-X( 3) = ( -8.96723890425260E-01,  6.96526650740091E-02)
-X( 4) = (  4.67530808227781E-01,  1.33593781852389E-01)
-X( 5) = (  4.08955073213483E-01,  5.09587694769519E-01)
-X( 6) = ( -1.06340978278925E+00,  1.95971935180570E-01)
-X( 7) = (  9.07104450970910E-01, -9.39529209909664E-02)
-X( 8) = ( -4.68117719657311E-01, -1.82059147162841E-01)
-
-X( 9) = ( -1.25702780792906E+00, -1.15054322456876E+00)
-
-PATH NUMBER =        16
-
-ARCLEN =  7.07216744270981E+01
-NFE =  303
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.53035031125336E-14
-
-X( 1) = ( -8.45196877409834E-01,  7.92235415426025E-01)
-X( 2) = (  1.12566385494450E+00,  5.94844452320603E-01)
-X( 3) = ( -3.54281084626981E-01,  8.41957515842726E-02)
-X( 4) = ( -9.39458343171759E-01, -3.17512345375023E-02)
-X( 5) = ( -1.16156403958416E+00,  1.51629198529726E+00)
-X( 6) = (  1.72860198938115E+00,  1.01889865593729E+00)
-X( 7) = ( -9.87295286067430E-01, -5.58588121492157E-03)
-X( 8) = ( -1.62572967705491E-01,  3.39227011099108E-02)
-
-X( 9) = ( -1.03785950509688E+00,  2.40323711399866E+00)
-
-PATH NUMBER =        17
-
-ARCLEN =  3.60141361889238E+01
-NFE =  222
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.18337609438688E-13
-
-X( 1) = (  4.70217655541981E+14, -1.67485143109280E+14)
-X( 2) = ( -1.67485143109280E+14, -4.70217655541981E+14)
-X( 3) = (  1.19559732569376E-01,  3.92355522623621E-01)
-X( 4) = ( -2.07871695042455E-01,  3.50514061862888E+00)
-X( 5) = ( -5.69005940454520E+00, -6.73392528039361E+00)
-X( 6) = ( -1.59474895510518E+00,  2.06800649251218E+00)
-X( 7) = ( -1.79299672496100E+14,  4.91642234735447E+13)
-X( 8) = ( -4.91642234735447E+13, -1.79299672496100E+14)
-
-X( 9) = ( -2.02022101304655E-15,  5.04690690281140E-15)
-
-PATH NUMBER =        18
-
-ARCLEN =  9.04824021047454E+00
-NFE =  117
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.02533291512332E-13
-
-X( 1) = ( -4.94156665689308E+11, -2.21269380235306E+13)
-X( 2) = (  2.21269380235306E+13, -4.94156665688524E+11)
-X( 3) = ( -5.85569093247113E-01, -4.44007486463934E-01)
-X( 4) = (  9.32157063013639E-01, -2.81036938780900E-01)
-X( 5) = ( -1.22620201967713E+13, -2.66878856016024E+13)
-X( 6) = (  2.66878856016014E+13, -1.22620201967673E+13)
-X( 7) = ( -1.07445836431984E-01,  5.94930734236552E-01)
-X( 8) = ( -1.08145841830895E+00, -5.06451710635198E-01)
-
-X( 9) = (  6.78719589347144E-14,  4.45568061613333E-14)
-
-PATH NUMBER =        19
-
-ARCLEN =  3.54854218018179E+01
-NFE =  174
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.44390380823410E-13
-
-X( 1) = (  6.15575098704115E-02,  4.35575446487975E-13)
-X( 2) = (  9.98103538205396E-01, -3.40230213925256E-13)
-X( 3) = ( -9.61509161663086E-01,  2.52859585007590E-13)
-X( 4) = (  2.74772873547896E-01,  1.90893277362428E-13)
-X( 5) = (  6.17807316614285E-01,  7.17304378849648E-14)
-X( 6) = (  7.86329523506143E-01, -4.69111028028892E-13)
-X( 7) = ( -6.73376870837197E-02,  4.96091937518121E-15)
-X( 8) = ( -9.97730242048595E-01,  2.42008030215639E-14)
-
-X( 9) = (  4.33522692248785E-01,  6.58042751673361E-01)
-
-PATH NUMBER =        20
-
-ARCLEN =  1.09051140764091E+01
-NFE =  144
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.19511530789486E-12
-
-X( 1) = ( -6.80761005053339E+14, -1.13073119461595E+14)
-X( 2) = ( -1.13073119461589E+14,  6.80761005053324E+14)
-X( 3) = (  1.26622039287382E-01,  4.68754487327243E+00)
-X( 4) = ( -1.66578169378025E+01,  1.01256465321531E+01)
-X( 5) = (  5.90769682910701E+01,  5.61341985584259E+00)
-X( 6) = ( -1.65383822272943E+01,  1.60054746291996E+01)
-X( 7) = ( -3.51394346217344E+14,  1.80182704342815E+14)
-X( 8) = (  1.80182704342814E+14,  3.51394346217341E+14)
-
-X( 9) = (  9.22357893187731E-16,  7.33245929251947E-16)
-
-PATH NUMBER =        21
-
-ARCLEN =  2.34976638377792E+01
-NFE =  166
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.58818191698838E-14
-
-X( 1) = ( -1.29626865906874E-01, -1.85405888581042E-01)
-X( 2) = (  1.00902900917828E+00, -2.38185265624941E-02)
-X( 3) = ( -5.06099762670937E-01,  1.97612071536567E+00)
-X( 4) = ( -2.20339260732316E+00, -4.53897422425637E-01)
-X( 5) = ( -1.25562726235550E+00, -4.31546989110036E-02)
-X( 6) = ( -7.11621633744556E-02,  7.61447008943106E-01)
-X( 7) = (  2.34519131484161E-01, -1.86661190037687E+00)
-X( 8) = (  2.11473191547315E+00,  2.07003165976450E-01)
-
-X( 9) = (  3.40339925664110E-01, -5.04168983103126E-01)
-
-PATH NUMBER =        22
-
-ARCLEN =  7.00701465931063E+01
-NFE =  239
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.94278307887966E-15
-
-X( 1) = (  2.14793042820633E+15,  4.07583814768301E+15)
-X( 2) = ( -4.07583814768301E+15,  2.14793042820633E+15)
-X( 3) = ( -2.74879897175334E-01, -9.10199823349851E-01)
-X( 4) = ( -1.41956663119988E+00,  1.29623998671805E-01)
-X( 5) = (  4.60952809786814E+15, -2.17346944131111E+15)
-X( 6) = ( -2.17346944131111E+15, -4.60952809786814E+15)
-X( 7) = (  6.45694979359630E-01,  9.22711808753069E-01)
-X( 8) = ( -1.33769790085770E+00,  3.74415910864669E-01)
-
-X( 9) = ( -3.67219275820840E-16,  3.57298825942598E-16)
-
-PATH NUMBER =        23
-
-ARCLEN =  4.83641128520754E+00
-NFE =  144
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.05026178266240E-14
-
-X( 1) = ( -3.59213282135402E-01,  1.75620811047262E-01)
-X( 2) = (  9.51945474476283E-01,  6.62698963743436E-02)
-X( 3) = (  1.07619680311176E+00, -3.86550605399062E-02)
-X( 4) = ( -1.01778566379974E-01, -4.08734904182389E-01)
-X( 5) = ( -1.33456507217685E+00, -6.81624099524742E-01)
-X( 6) = (  8.74702052835706E-01, -1.03997894212165E+00)
-X( 7) = ( -1.07398005488249E+00, -6.47210247186714E-02)
-X( 8) = ( -1.65402932515426E-01,  4.20240975309956E-01)
-
-X( 9) = (  1.63557454701097E-02,  3.34810029448678E-01)
-
-PATH NUMBER =        24
-
-ARCLEN =  2.52093368544350E+00
-NFE =   91
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.68627910926764E-13
-
-X( 1) = ( -9.99996101363611E-01,  2.36727890749498E-14)
-X( 2) = (  2.79235699364358E-03,  9.50287557214188E-14)
-X( 3) = ( -7.87055930991067E-01, -3.64230721580544E-16)
-X( 4) = ( -6.16881643017349E-01,  2.84775136718138E-15)
-X( 5) = ( -9.64617850094934E-01, -9.03181978152662E-15)
-X( 6) = (  2.63652049637717E-01,  3.87492262600574E-14)
-X( 7) = ( -7.91552581806901E-01,  1.82738362247220E-15)
-X( 8) = ( -6.11101063846912E-01, -1.50929562788160E-15)
-
-X( 9) = ( -2.40512729384052E-01,  6.14752116379344E-01)
-
-PATH NUMBER =        25
-
-ARCLEN =  6.66884124194915E+00
-NFE =  166
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.18799082981571E-18
-
-X( 1) = (  1.16231199225215E+00,  1.87679591182623E-01)
-X( 2) = (  3.33772014513974E-01, -6.53566596499098E-01)
-X( 3) = (  6.06760099173197E+00,  1.30472521573209E+00)
-X( 4) = ( -1.32197811553568E+00,  5.98841381705163E+00)
-X( 5) = ( -1.53635384798666E+00,  1.93378873591128E-01)
-X( 6) = (  2.52300382664372E-01,  1.17755816865437E+00)
-X( 7) = ( -5.91454538188608E+00, -7.03796500475026E-01)
-X( 8) = (  7.13926056317137E-01, -5.83062672224844E+00)
-
-X( 9) = (  1.03651063390585E-01,  8.00807080194727E-02)
-
-PATH NUMBER =        26
-
-ARCLEN =  7.59409782252095E+01
-NFE =  312
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.28094959474645E-14
-
-X( 1) = (  8.82849248270665E-02,  2.09844535749677E-01)
-X( 2) = (  1.01812160806675E+00, -1.81963617285406E-02)
-X( 3) = (  6.08392880071454E-01, -1.71205029497004E-03)
-X( 4) = ( -7.93638933696672E-01, -1.31243461674606E-03)
-X( 5) = ( -4.22090915226489E-01,  5.75142790295997E-01)
-X( 6) = (  1.09620780507534E+00,  2.21456685144921E-01)
-X( 7) = ( -9.54400887068397E-01, -2.08881184804503E-02)
-X( 8) = (  3.06255751857126E-01, -6.50947408694877E-02)
-
-X( 9) = (  1.66076772431726E-01,  6.19363641873720E-01)
-
-PATH NUMBER =        27
-
-ARCLEN =  4.43562614509065E+01
-NFE =  225
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.59673593117897E-16
-
-X( 1) = ( -5.73993644466773E-01, -2.63874515550235E-01)
-X( 2) = ( -8.77471389081319E-01,  1.72612231859958E-01)
-X( 3) = ( -3.06129886067411E-01,  1.27633565998051E-01)
-X( 4) = (  9.61367068432931E-01,  4.06425914724232E-02)
-X( 5) = (  1.06286154111226E+00,  3.09983707316457E-02)
-X( 6) = ( -8.91250080067843E-02,  3.69671507746717E-01)
-X( 7) = (  5.35586935983242E-01,  3.55587300380969E-02)
-X( 8) = ( -8.45528470021299E-01,  2.25241277423574E-02)
-
-X( 9) = (  2.16781251038137E-01,  5.67227959257713E-01)
-
-PATH NUMBER =        28
-
-ARCLEN =  1.69196033595648E+01
-NFE =  173
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.74130148968577E-15
-
-X( 1) = ( -9.97032338354654E-01, -1.18378623001895E-16)
-X( 2) = ( -7.69838702264929E-02,  1.12372308730104E-15)
-X( 3) = ( -2.06407758039435E-02,  4.99714362500832E-16)
-X( 4) = (  9.99786956493338E-01,  7.08533739034605E-17)
-X( 5) = (  6.44732206382427E-01, -8.07365462237152E-16)
-X( 6) = (  7.64408517779104E-01,  6.78824875319096E-16)
-X( 7) = (  1.83959491902010E-01, -2.87257830429225E-16)
-X( 8) = ( -9.82933825513780E-01, -1.21175767944206E-16)
-
-X( 9) = (  1.49403776693588E-01,  3.96567181604940E-01)
-
-PATH NUMBER =        29
-
-ARCLEN =  1.07837964731685E+01
-NFE =  169
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.13035201597751E-15
-
-X( 1) = ( -1.20303639139091E+14,  3.67347802816081E+14)
-X( 2) = ( -3.67347802816081E+14, -1.20303639139091E+14)
-X( 3) = ( -4.08169122850574E-01, -4.62654543187986E-01)
-X( 4) = (  1.05131384059413E+00, -2.36090349552811E-01)
-X( 5) = (  3.75702193424951E+14, -9.06512641246848E+13)
-X( 6) = ( -9.06512641246848E+13, -3.75702193424951E+14)
-X( 7) = (  7.17364403546662E-01,  7.89532127737193E-01)
-X( 8) = ( -1.18819901032164E+00,  4.58924480875575E-01)
-
-X( 9) = ( -9.26252550679206E-16,  2.52722105395509E-15)
-
-PATH NUMBER =        30
-
-ARCLEN =  7.71238968364947E+01
-NFE =  318
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.53090454074260E-14
-
-X( 1) = ( -8.01563642853414E-01,  4.27103037978949E-01)
-X( 2) = (  8.40201275122200E-01,  4.07462208321898E-01)
-X( 3) = ( -3.63818630922037E+00,  3.13016201582226E+00)
-X( 4) = (  3.19905480977630E+00,  3.55983666075495E+00)
-X( 5) = (  1.08100630676358E+00, -8.35636949104299E-02)
-X( 6) = (  2.00993027177774E-01,  4.49432910599155E-01)
-X( 7) = (  6.88801025267281E-01,  3.94152999316655E+00)
-X( 8) = ( -4.06296944890421E+00,  6.68213220541707E-01)
-
-X( 9) = (  4.15817220048389E-01,  3.24413282733443E-01)
-
-PATH NUMBER =        31
-
-ARCLEN =  2.21446820667273E+01
-NFE =  161
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.34349791363437E-14
-
-X( 1) = ( -2.99224652679902E+14, -3.07577636497202E+14)
-X( 2) = ( -3.07577636497202E+14,  2.99224652679902E+14)
-X( 3) = ( -2.93232350489852E-01,  6.49611040120239E-01)
-X( 4) = ( -8.92760038396564E-01,  2.55083250309807E-01)
-X( 5) = (  3.25200456722270E+14, -3.45764909091618E+14)
-X( 6) = (  3.45764909091618E+14,  3.25200456722272E+14)
-X( 7) = (  3.52984658769345E-01, -6.18109769960886E-01)
-X( 8) = ( -9.84149087380606E-01, -3.38529407493446E-01)
-
-X( 9) = (  2.34597124983572E-15,  2.80125315305080E-15)
-
-PATH NUMBER =        32
-
-ARCLEN =  5.85652170771843E+01
-NFE =  325
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.36481396151466E-12
-
-X( 1) = ( -6.96204783411646E-01, -2.82314694373776E+00)
-X( 2) = (  1.62729860295153E+00,  1.29488615093830E+00)
-X( 3) = ( -5.32772662970082E+11, -1.16356889176312E+12)
-X( 4) = ( -1.16356889176301E+12,  5.32772662970049E+11)
-X( 5) = (  2.03471296966445E+13,  8.85337400862551E+13)
-X( 6) = (  8.85337400862552E+13, -2.03471296966445E+13)
-X( 7) = ( -2.19644973048529E+00,  2.31329428016593E+00)
-X( 8) = ( -5.10216082494790E-01, -8.54084228088888E-01)
-
-X( 9) = (  7.63853973020749E-15, -8.97865766111283E-15)
-
-PATH NUMBER =        33
-
-ARCLEN =  7.76351964400598E+01
-NFE =  288
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.30730651207096E-14
-
-X( 1) = ( -1.75552111891177E+01,  1.20588362091030E+01)
-X( 2) = (  1.61187689412808E+01, -4.19061464579784E+00)
-X( 3) = ( -2.08356156818472E+13, -2.71031178505577E+14)
-X( 4) = (  2.71031178505577E+14, -2.08356156818475E+13)
-X( 5) = ( -2.77501097372587E+15,  2.94536661756667E+15)
-X( 6) = ( -2.94536661756667E+15, -2.77501097372587E+15)
-X( 7) = ( -8.50534355643150E-01, -1.93165873005938E+00)
-X( 8) = ( -6.06340286872399E-01,  3.48594995292688E-01)
-
-X( 9) = (  7.16471288764522E-17, -5.62429876976855E-16)
-
-PATH NUMBER =        34
-
-ARCLEN =  1.03480459881285E+01
-NFE =  164
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.29984162305643E-12
-
-X( 1) = ( -2.30019459459634E+00,  1.46497011272460E+01)
-X( 2) = ( -9.39513447225063E-01, -9.93998151039656E+00)
-X( 3) = ( -8.14784173204986E+13, -5.76794537887547E+13)
-X( 4) = ( -5.76794537887547E+13,  8.14784173204983E+13)
-X( 5) = ( -6.37154420112706E+14,  8.59004021374458E+14)
-X( 6) = ( -8.59004021374461E+14, -6.37154420112704E+14)
-X( 7) = ( -1.82950265115383E+00, -6.12607196504703E-01)
-X( 8) = ( -2.08439150861169E-01,  2.89806985519037E-01)
-
-X( 9) = (  1.13022994283930E-16, -1.45911928373099E-15)
-
-PATH NUMBER =        35
-
-ARCLEN =  7.42669258257345E+00
-NFE =  167
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.27093064640650E-13
-
-X( 1) = (  6.20566610585382E+14, -9.14612994775452E+14)
-X( 2) = (  9.14612994775452E+14,  6.20566610585378E+14)
-X( 3) = ( -2.53377814874736E-01, -1.11259716505605E+00)
-X( 4) = ( -1.19393412444416E+00, -1.13204039131874E+00)
-X( 5) = (  1.27937573293725E+15, -2.51074688620246E+14)
-X( 6) = (  2.51074688620311E+14,  1.27937573293723E+15)
-X( 7) = ( -5.82162106321728E-01, -1.34495666831018E+00)
-X( 8) = ( -2.63376293036168E+00,  1.15226490752000E+00)
-
-X( 9) = (  7.39253086913874E-16, -5.41016884070267E-17)
-
-PATH NUMBER =        36
-
-ARCLEN =  6.36953644340993E+00
-NFE =  166
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.41661531338450E-12
-
-X( 1) = (  1.91288488808952E+00, -4.73618755965025E-01)
-X( 2) = ( -6.53176055705104E-01, -5.03085332834546E-01)
-X( 3) = (  4.39654880333172E+11,  1.21202561066846E+12)
-X( 4) = ( -1.21202561066598E+12,  4.39654880335760E+11)
-X( 5) = ( -1.24970710908502E+14, -9.41377075086893E+13)
-X( 6) = ( -9.41377075086894E+13,  1.24970710908502E+14)
-X( 7) = ( -3.66024446023273E+00, -7.28578637108450E-01)
-X( 8) = (  2.21179032033561E-01, -1.14481128761927E+00)
-
-X( 9) = ( -6.80554889515277E-15,  9.07965109347986E-16)
-
-PATH NUMBER =        37
-
-ARCLEN =  1.00033509036866E+01
-NFE =  238
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.80233583013328E-12
-
-X( 1) = (  1.79457965761442E+12,  1.61101818450830E+13)
-X( 2) = ( -1.61101818450828E+13,  1.79457965761431E+12)
-X( 3) = ( -3.82179050901053E-01,  3.80356881808356E-03)
-X( 4) = (  6.42528937801772E-02, -7.70208147679447E-01)
-X( 5) = ( -2.82122872354855E+00,  3.72681229781772E-01)
-X( 6) = (  2.04186051649674E+00,  2.65550322792329E+00)
-X( 7) = ( -6.68018017516390E+12,  7.50177632184464E+12)
-X( 8) = ( -7.50177632184485E+12, -6.68018017516438E+12)
-
-X( 9) = ( -2.98155732958785E-14,  1.64809572239522E-14)
-
-PATH NUMBER =        38
-
-ARCLEN =  1.30741639628679E+01
-NFE =  140
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.85687434486652E-17
-
-X( 1) = (  2.29357256355386E-01, -1.05973321911562E-16)
-X( 2) = (  9.73342308212856E-01, -1.28029968464012E-17)
-X( 3) = (  2.39309340396267E-01,  2.85635630980499E-16)
-X( 4) = ( -9.70943376103418E-01,  5.20659698301769E-17)
-X( 5) = ( -9.93991529928234E-01,  1.21141653267058E-16)
-X( 6) = (  1.09457016362260E-01,  3.06546057351836E-16)
-X( 7) = ( -1.30933055767339E-01, -4.94925855386172E-16)
-X( 8) = (  9.91391211836895E-01, -2.08767606604171E-16)
-
-X( 9) = ( -5.89507762587040E-01,  8.68750890198777E-01)
-
-PATH NUMBER =        39
-
-ARCLEN =  2.14355872576856E+01
-NFE =  161
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.87819907970774E-12
-
-X( 1) = (  2.88652684211148E+12,  1.69115684103059E+13)
-X( 2) = ( -1.69115684103056E+13,  2.88652684211134E+12)
-X( 3) = ( -3.97575446134761E-01,  6.26308127738048E-02)
-X( 4) = (  2.42077904421929E-01, -5.56771582932506E-01)
-X( 5) = ( -2.22761579422894E+00,  7.64968061532983E-01)
-X( 6) = (  2.35988626512023E+00,  2.50097205073267E+00)
-X( 7) = ( -6.59704748992132E+12,  8.33698818035170E+12)
-X( 8) = ( -8.33698818035195E+12, -6.59704748992182E+12)
-
-X( 9) = ( -2.90279071938314E-14,  1.39092838809252E-14)
-
-PATH NUMBER =        40
-
-ARCLEN =  7.97285455838431E+00
-NFE =  185
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.56697715018734E-14
-
-X( 1) = ( -1.71025797309071E+14, -6.45783350769063E+14)
-X( 2) = ( -6.45783350769063E+14,  1.71025797309071E+14)
-X( 3) = ( -5.79594338537673E-01,  7.37369844556909E-01)
-X( 4) = ( -1.09865328553740E+00,  1.14951303239342E-02)
-X( 5) = ( -4.24547807890060E+14, -9.92025602452147E+14)
-X( 6) = ( -9.92025602452147E+14,  4.24547807890061E+14)
-X( 7) = ( -9.18145838578446E-01, -2.36543210252649E-01)
-X( 8) = ( -3.03183788777296E-01,  2.30650320164694E-01)
-
-X( 9) = ( -1.06892508624883E-15,  8.77932709170137E-16)
-
-PATH NUMBER =        41
-
-ARCLEN =  2.91731652043185E+01
-NFE =  310
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.42403374452144E-15
-
-X( 1) = (  9.51044815428272E-01, -3.30314788813085E-03)
-X( 2) = ( -3.09237559760445E-01, -1.01586679057786E-02)
-X( 3) = ( -1.67483475490117E-01, -4.01571993917393E-02)
-X( 4) = (  9.86715940318371E-01, -6.81621431787958E-03)
-X( 5) = (  3.58070010433482E-01,  1.34366160073985E-01)
-X( 6) = ( -9.44687224087698E-01,  5.09295469577902E-02)
-X( 7) = (  8.88159812042096E-01, -2.54383575921023E-02)
-X( 8) = ( -4.62819970372660E-01, -4.88166638087578E-02)
-
-X( 9) = ( -3.96658584600771E-01,  2.08903751849682E+00)
-
-PATH NUMBER =        42
-
-ARCLEN =  5.19567120579855E+01
-NFE =  220
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.66346090667101E-14
-
-X( 1) = (  8.86905474091763E-01,  8.10570248304621E-15)
-X( 2) = (  4.61950949805369E-01,  2.30812769227194E-15)
-X( 3) = (  6.98952745885596E-01,  7.79392071036960E-15)
-X( 4) = (  7.15167853737116E-01,  1.89535847020813E-15)
-X( 5) = ( -1.60239444861595E-02, -1.37087072786988E-15)
-X( 6) = ( -9.99871608359358E-01, -4.59332874026866E-15)
-X( 7) = ( -6.88217284181041E-01, -1.15874088312436E-14)
-X( 8) = ( -7.25504631104777E-01,  6.76447250006478E-16)
-
-X( 9) = (  1.46631975755902E-01,  3.75914083210410E-01)
-
-PATH NUMBER =        43
-
-ARCLEN =  2.90753521364350E+01
-NFE =  246
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.81515855384220E-13
-
-X( 1) = (  9.96860628983464E+14, -7.72021913607246E+14)
-X( 2) = (  7.72021913607246E+14,  9.96860628983464E+14)
-X( 3) = (  6.85515166469135E-01, -1.48356087232362E+00)
-X( 4) = ( -1.05676460798252E+00, -3.30259353792087E+00)
-X( 5) = ( -5.18340591434259E+00, -8.67086708526652E+00)
-X( 6) = ( -2.03029522370416E+00,  2.70248308006967E+00)
-X( 7) = ( -7.68776825588054E+14, -1.39495889850678E+14)
-X( 8) = (  1.39495889850677E+14, -7.68776825588054E+14)
-
-X( 9) = (  5.97422502093825E-16,  9.96381796514179E-17)
-
-PATH NUMBER =        44
-
-ARCLEN =  4.49925200375022E+00
-NFE =  136
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.61763882451839E-16
-
-X( 1) = (  1.08707913283362E+00,  1.12206976693261E-01)
-X( 2) = (  2.52695630148078E-01, -4.82706657214905E-01)
-X( 3) = ( -7.60926702188131E-01,  3.00226576434989E-01)
-X( 4) = (  7.73530340563732E-01,  2.95334787449215E-01)
-X( 5) = (  1.11306763775108E+00, -1.06662124290858E-01)
-X( 6) = ( -2.25085865185254E-01, -5.27452750639071E-01)
-X( 7) = (  5.60758078600111E-01, -2.75952812846166E-01)
-X( 8) = ( -8.89908277794077E-01, -1.73886200384035E-01)
-
-X( 9) = (  9.28432400829280E-01,  3.27945850969518E-01)
-
-PATH NUMBER =        45
-
-ARCLEN =  2.57648436026273E+01
-NFE =  218
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.90906169934793E-18
-
-X( 1) = ( -1.17580884606015E+00,  3.91945730962369E-01)
-X( 2) = (  6.00333423168922E-01,  7.67662168813461E-01)
-X( 3) = ( -4.46316901221626E-01, -4.48073453470396E-02)
-X( 4) = ( -8.96273829690172E-01,  2.23126848790969E-02)
-X( 5) = ( -1.71041655462014E+00, -8.19910369153663E-01)
-X( 6) = (  9.53617690809595E-01, -1.47059799982795E+00)
-X( 7) = ( -9.69616408977201E-01, -9.02774498392315E-03)
-X( 8) = ( -2.47341824528349E-01,  3.53900909769933E-02)
-
-X( 9) = ( -2.15214223555136E-01,  5.06210377144441E-01)
-
-PATH NUMBER =        46
-
-ARCLEN =  1.88875417706277E+01
-NFE =  210
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.77587260410412E-16
-
-X( 1) = (  4.77229881863295E-03, -9.13737241708533E-17)
-X( 2) = ( -9.99988612517155E-01,  4.10757632866305E-16)
-X( 3) = ( -7.94232615166545E-01,  8.49721431376296E-16)
-X( 4) = ( -6.07613818971976E-01,  2.02936788232216E-15)
-X( 5) = (  9.97769920671558E-01,  2.87382108757191E-16)
-X( 6) = (  6.67471752441137E-02, -5.08058327209501E-16)
-X( 7) = (  9.52226100439732E-01,  8.77937288524113E-16)
-X( 8) = (  3.05393931899998E-01, -9.30386347793833E-16)
-
-X( 9) = ( -9.02761037145785E-01, -1.43160827988643E-01)
-
-PATH NUMBER =        47
-
-ARCLEN =  2.01444528518898E+01
-NFE =  199
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.38165565910716E-15
-
-X( 1) = ( -8.34752967466924E+14,  2.49964963515073E+15)
-X( 2) = (  2.49964963515073E+15,  8.34752967466924E+14)
-X( 3) = ( -6.17173607030381E-01,  9.68114602044597E-01)
-X( 4) = ( -1.25302213777308E+00, -3.95180963189881E-01)
-X( 5) = (  1.37606302826279E+15,  2.78751802931300E+15)
-X( 6) = (  2.78751802931300E+15, -1.37606302826279E+15)
-X( 7) = (  6.94734809604685E-01,  6.34459451114224E-01)
-X( 8) = ( -1.05857351873949E+00,  5.01990771470538E-01)
-
-X( 9) = (  4.65820687144819E-16, -1.51300413170352E-16)
-
-PATH NUMBER =        48
-
-ARCLEN =  5.87093854943917E+01
-NFE =  353
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.68776741524110E-13
-
-X( 1) = (  1.44390329610672E+01, -7.73139058901546E+00)
-X( 2) = ( -7.36950827539268E+00,  8.98802124124152E+00)
-X( 3) = (  7.42977846506812E+13, -8.74126074754872E+13)
-X( 4) = ( -8.74126074754853E+13, -7.42977846506815E+13)
-X( 5) = ( -6.41909371187428E+15,  5.01112922611160E+15)
-X( 6) = (  5.01112922611160E+15,  6.41909371187429E+15)
-X( 7) = ( -2.85349499989717E+00, -8.17675662399287E-01)
-X( 8) = (  5.01377037608616E-01, -7.26060808860983E-01)
-
-X( 9) = ( -5.46912233383157E-17, -1.19587499625151E-16)
-
-PATH NUMBER =        49
-
-ARCLEN =  5.46611960955841E+00
-NFE =  121
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.49794479127126E-15
-
-X( 1) = ( -8.28253379807933E-01, -5.66208311141470E-01)
-X( 2) = ( -9.39953195542938E-01,  4.98922658704702E-01)
-X( 3) = ( -2.88293160145085E-01,  1.92429259310048E-01)
-X( 4) = (  9.78330979423583E-01,  5.67047762338648E-02)
-X( 5) = (  1.28667055008929E+00, -7.48750669668265E-02)
-X( 6) = (  1.18237411569358E-01,  8.14797468275650E-01)
-X( 7) = (  4.88755859727676E-01, -1.68192955396118E-01)
-X( 8) = ( -8.93239162923569E-01, -9.20305511971852E-02)
-
-X( 9) = (  3.11857876897455E-01,  4.32532337746843E-01)
-
-PATH NUMBER =        50
-
-ARCLEN =  7.83913438621981E+00
-NFE =  104
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.77781320949722E-14
-
-X( 1) = ( -6.44884386482955E-01,  5.32942931706628E-16)
-X( 2) = (  7.64280137168631E-01,  1.84297593418823E-15)
-X( 3) = (  6.26491381419067E-01,  1.43507386800131E-15)
-X( 4) = (  7.79428347577651E-01, -6.93967776450982E-17)
-X( 5) = ( -7.57037314113670E-01, -2.38365318483347E-15)
-X( 6) = (  6.53371643890025E-01,  7.55759824111083E-16)
-X( 7) = ( -4.88045334896592E-01, -1.13263223521619E-15)
-X( 8) = ( -8.72818280677984E-01,  7.39287680354173E-17)
-
-X( 9) = (  1.03685357125168E-01,  3.79066222595481E-01)
-
-PATH NUMBER =        51
-
-ARCLEN =  7.24935249379100E+00
-NFE =  117
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.87646200950746E-15
-
-X( 1) = (  1.27925568125805E+00, -2.82792348757015E-01)
-X( 2) = ( -4.22066367675235E-01, -8.57125197528378E-01)
-X( 3) = (  6.69598674729621E+00,  1.38313258399864E+00)
-X( 4) = ( -1.39815366279890E+00,  6.62404834220325E+00)
-X( 5) = ( -1.40358102984342E+00, -1.44410309311865E-01)
-X( 6) = (  2.03645160065798E-01, -9.95317397174894E-01)
-X( 7) = (  2.31705420969071E-01,  6.46288795781603E+00)
-X( 8) = (  6.53969930518754E+00, -2.28983949423155E-01)
-
-X( 9) = ( -9.99057691375871E-02,  2.79467469040245E-01)
-
-PATH NUMBER =        52
-
-ARCLEN =  3.50112085547313E+00
-NFE =  125
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.04138196330907E-15
-
-X( 1) = (  1.30577357530749E+15,  2.42803109436892E+15)
-X( 2) = (  2.42803109436892E+15, -1.30577357530749E+15)
-X( 3) = ( -7.04009645593114E-01,  2.61347631984371E-01)
-X( 4) = (  7.47163050791735E-01,  1.97696294088739E-01)
-X( 5) = (  3.10800506272234E+14,  3.64518822300857E+15)
-X( 6) = (  3.64518822300857E+15, -3.10800506272234E+14)
-X( 7) = ( -1.14766175588437E+00, -9.50953316305650E-01)
-X( 8) = ( -2.01011593878904E-01,  1.85881124044763E-01)
-
-X( 9) = (  1.25011898619368E-16, -3.71881345162528E-16)
-
-PATH NUMBER =        53
-
-ARCLEN =  8.43163298883517E+00
-NFE =  114
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.72397805810166E-17
-
-X( 1) = ( -8.40062525275419E-01, -3.31061653116359E-01)
-X( 2) = (  7.38680181298250E-01, -3.76499187848783E-01)
-X( 3) = (  5.17100724931634E-01, -3.88067038518990E+00)
-X( 4) = (  4.00539746007343E+00,  5.00998337719430E-01)
-X( 5) = ( -1.65699648586207E+00,  5.82716504385742E-02)
-X( 6) = ( -7.30400050240804E-02, -1.32195938335803E+00)
-X( 7) = (  3.73775710005446E+00, -7.06361391302762E-01)
-X( 8) = ( -7.32043054625678E-01, -3.60662844741596E+00)
-
-X( 9) = ( -5.15229660971559E-01,  2.92705888143544E-01)
-
-PATH NUMBER =        54
-
-ARCLEN =  7.34404417713525E+00
-NFE =  107
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.29501890713204E-16
-
-X( 1) = ( -1.29626865906874E-01,  1.85405888581043E-01)
-X( 2) = (  1.00902900917828E+00,  2.38185265624938E-02)
-X( 3) = ( -5.06099762670942E-01, -1.97612071536567E+00)
-X( 4) = ( -2.20339260732317E+00,  4.53897422425641E-01)
-X( 5) = ( -1.25562726235550E+00,  4.31546989110054E-02)
-X( 6) = ( -7.11621633744571E-02, -7.61447008943107E-01)
-X( 7) = (  2.34519131484164E-01,  1.86661190037687E+00)
-X( 8) = (  2.11473191547315E+00, -2.07003165976452E-01)
-
-X( 9) = ( -2.42089765152999E-01,  5.79340132888630E-02)
-
-PATH NUMBER =        55
-
-ARCLEN =  1.11003393013051E+01
-NFE =  151
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.27554936439169E-14
-
-X( 1) = (  8.82849248270421E-02, -2.09844535749686E-01)
-X( 2) = (  1.01812160806676E+00,  1.81963617285523E-02)
-X( 3) = (  6.08392880071453E-01,  1.71205029495869E-03)
-X( 4) = ( -7.93638933696680E-01,  1.31243461673850E-03)
-X( 5) = ( -4.22090915226592E-01, -5.75142790296034E-01)
-X( 6) = (  1.09620780507529E+00, -2.21456685144935E-01)
-X( 7) = ( -9.54400887068391E-01,  2.08881184804593E-02)
-X( 8) = (  3.06255751857151E-01,  6.50947408695009E-02)
-
-X( 9) = (  7.92886514918350E-02,  4.68558883868231E-01)
-
-PATH NUMBER =        56
-
-ARCLEN =  9.45174126265599E+00
-NFE =  137
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.29344186000737E-16
-
-X( 1) = ( -1.77426252777162E-01, -1.99029462556136E-16)
-X( 2) = ( -9.84134099005545E-01,  2.27439090890869E-17)
-X( 3) = ( -9.99539785563503E-01, -1.79657408499650E-16)
-X( 4) = (  3.03350799515492E-02, -4.63144709959055E-16)
-X( 5) = (  9.06036666598331E-01, -1.38818324602203E-16)
-X( 6) = ( -4.23199195154462E-01,  6.03968359703376E-17)
-X( 7) = ( -3.37009206790885E-01, -4.83099941370453E-16)
-X( 8) = ( -9.41501351320421E-01,  1.29535864241670E-16)
-
-X( 9) = (  4.98620765029906E-02,  7.28877517895071E-01)
-
-PATH NUMBER =        57
-
-ARCLEN =  1.55383523727571E+01
-NFE =  150
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.66276244661547E-15
-
-X( 1) = ( -8.40062525275420E-01,  3.31061653116359E-01)
-X( 2) = (  7.38680181298250E-01,  3.76499187848784E-01)
-X( 3) = (  5.17100724931634E-01,  3.88067038518990E+00)
-X( 4) = (  4.00539746007344E+00, -5.00998337719430E-01)
-X( 5) = ( -1.65699648586207E+00, -5.82716504385750E-02)
-X( 6) = ( -7.30400050240810E-02,  1.32195938335803E+00)
-X( 7) = (  3.73775710005447E+00,  7.06361391302765E-01)
-X( 8) = ( -7.32043054625681E-01,  3.60662844741597E+00)
-
-X( 9) = (  1.06675935341772E+00, -4.07751282181768E-01)
-
-PATH NUMBER =        58
-
-ARCLEN =  1.24453354911386E+01
-NFE =  105
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.77711746892947E-18
-
-X( 1) = (  9.76148462455547E-01, -6.09487851453179E-17)
-X( 2) = (  2.17104074686936E-01, -1.00259169748283E-16)
-X( 3) = (  7.09264760346993E-02,  1.26209180493445E-16)
-X( 4) = (  9.97481546193863E-01, -6.37733173715910E-17)
-X( 5) = (  9.26212713628612E-01, -5.41728997304115E-17)
-X( 6) = ( -3.77001338343410E-01, -1.84131166445978E-17)
-X( 7) = ( -1.53496719696747E-01,  6.85014592403909E-17)
-X( 8) = ( -9.88149157284637E-01, -1.30194974755769E-17)
-
-X( 9) = (  2.62634958878214E-01,  4.11402940780107E-01)
-
-PATH NUMBER =        59
-
-ARCLEN =  2.33105170799279E+01
-NFE =  243
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.98729272578757E-14
-
-X( 1) = ( -1.78654801865914E-02, -2.42461036816530E-01)
-X( 2) = (  1.02882744214240E+00, -4.21031037064987E-03)
-X( 3) = ( -3.32182462985673E+00,  2.10811115213499E+00)
-X( 4) = ( -2.17826339358002E+00, -3.21484333266461E+00)
-X( 5) = (  1.09509784985606E+00, -4.19501638508552E-02)
-X( 6) = (  1.00815582087475E-01,  4.55678906801428E-01)
-X( 7) = (  2.99182814752131E+00, -1.24565781632941E+00)
-X( 8) = (  1.30852462014181E+00,  2.84808864862653E+00)
-
-X( 9) = ( -1.68418417618719E-01, -2.27518774812955E-01)
-
-PATH NUMBER =        60
-
-ARCLEN =  4.60629929752779E+00
-NFE =  130
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.74062555866364E-12
-
-X( 1) = ( -6.95793818601593E+14, -1.00364934759215E+14)
-X( 2) = ( -1.00364934759210E+14,  6.95793818601582E+14)
-X( 3) = (  1.78351454666944E-01,  3.53070594895553E+00)
-X( 4) = ( -1.25163745210633E+01,  7.66382567994618E+00)
-X( 5) = (  4.52215650326483E+01,  2.83386130556739E+00)
-X( 6) = ( -1.20756247702499E+01,  1.27005626403191E+01)
-X( 7) = ( -3.53968920309426E+14,  1.91148891187500E+14)
-X( 8) = (  1.91148891187499E+14,  3.53968920309423E+14)
-
-X( 9) = (  8.89858933067478E-16,  7.38937990657496E-16)
-
-PATH NUMBER =        61
-
-ARCLEN =  1.29686730178106E+01
-NFE =  169
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.05143712919271E-12
-
-X( 1) = (  5.84201488210481E+13,  3.68217360646102E+13)
-X( 2) = ( -3.68217360646099E+13,  5.84201488210490E+13)
-X( 3) = (  4.50983347707272E-01, -5.26453689068606E-01)
-X( 4) = ( -4.30270073774601E-01, -4.21577841036882E+00)
-X( 5) = ( -3.91698593363425E+00,  6.19081180109786E+00)
-X( 6) = ( -1.10947306752824E+00, -2.07631880253144E+00)
-X( 7) = (  5.07934765354217E+13,  4.17433617148607E+13)
-X( 8) = (  4.17433617148610E+13, -5.07934765354223E+13)
-
-X( 9) = ( -7.96251628000511E-15, -1.58412779421857E-15)
-
-PATH NUMBER =        62
-
-ARCLEN =  9.21256876748112E+00
-NFE =  138
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.75653104790422E-13
-
-X( 1) = (  1.27925568125806E+00,  2.82792348757011E-01)
-X( 2) = ( -4.22066367675230E-01,  8.57125197528387E-01)
-X( 3) = (  6.69598674729638E+00, -1.38313258399850E+00)
-X( 4) = ( -1.39815366279883E+00, -6.62404834220342E+00)
-X( 5) = ( -1.40358102984345E+00,  1.44410309311870E-01)
-X( 6) = (  2.03645160065794E-01,  9.95317397174913E-01)
-X( 7) = (  2.31705420969176E-01, -6.46288795781624E+00)
-X( 8) = (  6.53969930518771E+00,  2.28983949423244E-01)
-
-X( 9) = (  1.05769315624652E-01,  2.31328609138219E-01)
-
-PATH NUMBER =        63
-
-ARCLEN =  9.60992151024122E+00
-NFE =  109
-IFLAG2 = 11
-REAL, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.62724974338918E-15
-
-X( 1) = (  8.10309088191086E-01, -6.68959785377273E-17)
-X( 2) = (  5.86002714665154E-01, -1.18901687139457E-16)
-X( 3) = (  5.45184304735712E-01, -1.64493936046208E-16)
-X( 4) = ( -8.38316213531528E-01,  3.05640569555263E-17)
-X( 5) = (  9.37646003039472E-01,  1.06402108297129E-17)
-X( 6) = (  3.47591675654211E-01, -4.35013498528719E-17)
-X( 7) = (  3.68121016397541E-01,  8.33838299678403E-17)
-X( 8) = (  9.29777885995597E-01, -1.08544348734812E-16)
-
-X( 9) = ( -2.10708623075736E-01,  1.43280544555602E+00)
-
-PATH NUMBER =        64
-
-ARCLEN =  6.47681421475234E+00
-NFE =  112
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.57070966207400E-12
-
-X( 1) = (  7.36778408702471E+13,  6.35920697465202E+13)
-X( 2) = (  6.35920697465203E+13, -7.36778408702470E+13)
-X( 3) = (  1.66342480016045E-01,  4.07724546368551E-01)
-X( 4) = ( -1.43777775940089E-01,  3.78252154229667E+00)
-X( 5) = ( -5.24931379253417E+00,  7.27143438011111E+00)
-X( 6) = ( -1.88520945708423E+00, -1.96328067468444E+00)
-X( 7) = ( -5.55431046505254E+13, -4.09833851660698E+12)
-X( 8) = ( -4.09833851660697E+12,  5.55431046505254E+13)
-
-X( 9) = (  2.32872532021644E-14,  8.74484946261633E-15)
-
-PATH NUMBER =        65
-
-ARCLEN =  3.87486048293837E+01
-NFE =  239
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.72953983705528E-15
-
-X( 1) = (  4.20050784350076E+15, -6.50476716858191E+15)
-X( 2) = (  6.50476716858191E+15,  4.20050784350076E+15)
-X( 3) = ( -2.86264705790692E-01, -6.25521471517192E-01)
-X( 4) = (  9.15628213262757E-01,  2.29874029776489E-01)
-X( 5) = ( -8.50311617983231E+15, -6.91119621151474E+15)
-X( 6) = ( -6.91119621151474E+15,  8.50311617983231E+15)
-X( 7) = ( -8.13699591655085E-01, -4.72767536606080E-01)
-X( 8) = ( -3.95340170783936E-01,  2.22880554073006E-01)
-
-X( 9) = ( -2.12767900086702E-16, -1.63822948262560E-16)
-
-PATH NUMBER =        66
-
-ARCLEN =  5.07188169711562E+00
-NFE =  109
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.53498750358891E-14
-
-X( 1) = ( -9.00105260095757E+14, -2.70343982662084E+13)
-X( 2) = (  2.70343982662082E+13, -9.00105260095758E+14)
-X( 3) = (  7.13006035039033E-02, -3.32451714497913E-01)
-X( 4) = (  6.06633996983913E-01, -4.41279219420771E+00)
-X( 5) = ( -8.19013406411191E+00,  9.31186637507370E+00)
-X( 6) = ( -2.53778124634611E+00, -2.74960394864918E+00)
-X( 7) = ( -8.46991075094158E+14, -1.32812203803149E+14)
-X( 8) = ( -1.32812203803149E+14,  8.46991075094158E+14)
-
-X( 9) = (  4.64445105638478E-16,  4.14598910758457E-16)
-
-PATH NUMBER =        67
-
-ARCLEN =  1.30507995946843E+01
-NFE =  169
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.30213420526161E-17
-
-X( 1) = (  9.51044815428272E-01,  3.30314788813087E-03)
-X( 2) = ( -3.09237559760445E-01,  1.01586679057787E-02)
-X( 3) = ( -1.67483475490117E-01,  4.01571993917391E-02)
-X( 4) = (  9.86715940318371E-01,  6.81621431787943E-03)
-X( 5) = (  3.58070010433482E-01, -1.34366160073986E-01)
-X( 6) = ( -9.44687224087698E-01, -5.09295469577903E-02)
-X( 7) = (  8.88159812042096E-01,  2.54383575921026E-02)
-X( 8) = ( -4.62819970372659E-01,  4.88166638087581E-02)
-
-X( 9) = ( -3.87482241089900E-01,  1.57106404932325E+00)
-
-PATH NUMBER =        68
-
-ARCLEN =  3.45438381827585E+01
-NFE =  243
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.17678310479952E-13
-
-X( 1) = (  7.88373515627154E+00,  1.71950267191118E+01)
-X( 2) = ( -6.49842399572882E-01, -1.46413757040273E+01)
-X( 3) = (  7.83071691098351E+11, -4.52827630662447E+12)
-X( 4) = (  4.52827630662556E+12,  7.83071691099693E+11)
-X( 5) = ( -2.17981539159799E+14, -5.09376521186438E+14)
-X( 6) = ( -5.09376521186438E+14,  2.17981539159799E+14)
-X( 7) = ( -2.48592752437992E+00,  2.02812219620798E+00)
-X( 8) = ( -4.81370353680051E-01, -1.18632777788369E+00)
-
-X( 9) = ( -1.53390043451229E-15,  1.21110803677493E-15)
-
-PATH NUMBER =        69
-
-ARCLEN =  1.71689953002984E+01
-NFE =  159
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.70648224068144E-15
-
-X( 1) = ( -3.59213282135405E-01, -1.75620811047262E-01)
-X( 2) = (  9.51945474476282E-01, -6.62698963743439E-02)
-X( 3) = (  1.07619680311176E+00,  3.86550605399053E-02)
-X( 4) = ( -1.01778566379969E-01,  4.08734904182388E-01)
-X( 5) = ( -1.33456507217685E+00,  6.81624099524746E-01)
-X( 6) = (  8.74702052835708E-01,  1.03997894212166E+00)
-X( 7) = ( -1.07398005488249E+00,  6.47210247186722E-02)
-X( 8) = ( -1.65402932515429E-01, -4.20240975309955E-01)
-
-X( 9) = (  1.53866285983759E-01,  4.87415783780594E-01)
-
-PATH NUMBER =        70
-
-ARCLEN =  3.95685887848805E+00
-NFE =  113
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.27536846209207E-12
-
-X( 1) = ( -2.56699781295454E+13,  3.25557043891293E+13)
-X( 2) = ( -3.25557043891285E+13, -2.56699781295440E+13)
-X( 3) = ( -6.92300512637018E-02, -1.60959938863526E+00)
-X( 4) = ( -5.38509583911186E+00, -2.91479736016428E+00)
-X( 5) = ( -6.25465103709770E+00,  4.48694651671075E+00)
-X( 6) = (  3.09045159312515E+00, -4.43115231244911E+00)
-X( 7) = (  2.81271625335210E+13, -2.76917675221862E+13)
-X( 8) = ( -2.76917675221862E+13, -2.81271625335215E+13)
-
-X( 9) = ( -1.37464367146178E-14, -4.96781435432858E-15)
-
-PATH NUMBER =        71
-
-ARCLEN =  6.00848043170085E+00
-NFE =  131
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.69549778723868E-13
-
-X( 1) = (  2.96636429529155E+13,  8.40100975330234E+13)
-X( 2) = (  8.40100975330237E+13, -2.96636429529154E+13)
-X( 3) = ( -2.78821004012906E-02, -2.69874663200920E+00)
-X( 4) = (  1.84522964902530E+00,  3.54725828844238E+00)
-X( 5) = ( -3.37447807106614E+00,  4.95973228861253E+00)
-X( 6) = (  1.14632039039287E+00,  1.55523695373410E+00)
-X( 7) = (  8.68735770382083E+12,  3.20268628232786E+13)
-X( 8) = ( -3.20268628232796E+13,  8.68735770382224E+12)
-
-X( 9) = ( -9.85695628851618E-15,  2.50163388268443E-15)
-
-PATH NUMBER =        72
-
-ARCLEN =  1.89727860410938E+01
-NFE =  213
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.09440314597817E-13
-
-X( 1) = (  1.14763908609377E+00, -2.76493298067820E+00)
-X( 2) = ( -1.60314589621491E-01,  2.00896872835360E+00)
-X( 3) = ( -1.65449579577059E+14, -6.50372666759704E+14)
-X( 4) = ( -6.50372666759704E+14,  1.65449579577060E+14)
-X( 5) = (  6.71078110533372E+15, -1.16038108475665E+15)
-X( 6) = (  1.16038108475665E+15,  6.71078110533372E+15)
-X( 7) = (  7.28246400756067E-02, -1.16091567464065E+00)
-X( 8) = ( -3.59782987558362E-01,  1.18239698593559E-01)
-
-X( 9) = (  2.59991680962024E-16,  4.23814629224584E-16)
-
-PATH NUMBER =        73
-
-ARCLEN =  1.19484674776924E+01
-NFE =  181
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.42634312655409E-12
-
-X( 1) = (  1.00533906643184E+00, -1.33825640300821E+00)
-X( 2) = ( -4.15245961866520E-02,  5.67790851957155E-01)
-X( 3) = (  8.50951637140369E+11,  6.81132534583265E+11)
-X( 4) = (  6.81132534583397E+11, -8.50951637140407E+11)
-X( 5) = (  4.85674306726165E+13,  5.95730066196593E+13)
-X( 6) = (  5.95730066196594E+13, -4.85674306726167E+13)
-X( 7) = ( -2.32369413235677E+00,  2.44109174376112E+00)
-X( 8) = ( -4.77670775461364E-01, -9.28203605569483E-01)
-
-X( 9) = (  1.32502346497209E-14, -4.89956382757062E-15)
-
-PATH NUMBER =        74
-
-ARCLEN =  9.81691993584125E+00
-NFE =  183
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.77523783825166E-12
-
-X( 1) = ( -3.16187098194170E+00, -1.79733319146635E+00)
-X( 2) = (  2.02403554129413E+00,  1.72938621035805E+00)
-X( 3) = (  1.87818504216848E+13, -1.10102811404098E+12)
-X( 4) = (  1.10102811404352E+12,  1.87818504216840E+13)
-X( 5) = (  1.88924733491950E+14,  1.87358190522433E+14)
-X( 6) = ( -1.87358190522433E+14,  1.88924733491950E+14)
-X( 7) = ( -2.57592898249699E+00, -3.93984049552143E-01)
-X( 8) = ( -1.29435898472992E-02,  4.57804791211215E-01)
-
-X( 9) = (  7.24055960587416E-15, -8.54080261375456E-16)
-
-PATH NUMBER =        75
-
-ARCLEN =  4.72190739681866E+01
-NFE =  299
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.95488854254933E-17
-
-X( 1) = (  1.08707913283362E+00, -1.12206976693261E-01)
-X( 2) = (  2.52695630148078E-01,  4.82706657214905E-01)
-X( 3) = ( -7.60926702188131E-01, -3.00226576434989E-01)
-X( 4) = (  7.73530340563732E-01, -2.95334787449215E-01)
-X( 5) = (  1.11306763775108E+00,  1.06662124290858E-01)
-X( 6) = ( -2.25085865185254E-01,  5.27452750639071E-01)
-X( 7) = (  5.60758078600111E-01,  2.75952812846166E-01)
-X( 8) = ( -8.89908277794077E-01,  1.73886200384034E-01)
-
-X( 9) = ( -3.96950614853341E-02,  1.58750823181855E+00)
-
-PATH NUMBER =        76
-
-ARCLEN =  4.40494647229423E+01
-NFE =  265
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.32737371663135E-13
-
-X( 1) = ( -5.73993644466739E-01,  2.63874515549962E-01)
-X( 2) = ( -8.77471389081190E-01, -1.72612231859786E-01)
-X( 3) = ( -3.06129886067403E-01, -1.27633565998001E-01)
-X( 4) = (  9.61367068432927E-01, -4.06425914724047E-02)
-X( 5) = (  1.06286154111212E+00, -3.09983707316262E-02)
-X( 6) = ( -8.91250080067548E-02, -3.69671507746378E-01)
-X( 7) = (  5.35586935983201E-01, -3.55587300382486E-02)
-X( 8) = ( -8.45528470021312E-01, -2.25241277424516E-02)
-
-X( 9) = (  6.78684017147151E-02,  5.40722838430811E-01)
-
-PATH NUMBER =        77
-
-ARCLEN =  3.06602287600521E+01
-NFE =  201
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.14127079153706E-13
-
-X( 1) = (  3.76879103606614E+14,  4.16893367656824E+14)
-X( 2) = ( -4.16893367656824E+14,  3.76879103606614E+14)
-X( 3) = (  2.13079057313090E+00,  5.96361697597375E-01)
-X( 4) = (  1.15889300641227E+00, -3.83724285182254E+00)
-X( 5) = (  2.76601397312026E+00, -6.40385806936090E+00)
-X( 6) = ( -3.12330236244982E+00,  6.27441364347212E-02)
-X( 7) = (  3.59585277769457E+13, -3.46397745336714E+14)
-X( 8) = (  3.46397745336714E+14,  3.59585277769446E+13)
-
-X( 9) = (  3.24745655713721E-16, -1.31947404391486E-15)
-
-PATH NUMBER =        78
-
-ARCLEN =  2.87442544016090E+01
-NFE =  156
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.74026550244403E-17
-
-X( 1) = (  1.16805813859714E+00, -2.64606830344748E-01)
-X( 2) = (  4.41763649679256E-01,  6.99641452928462E-01)
-X( 3) = (  2.18650479698318E+00, -2.11047855621063E+00)
-X( 4) = ( -2.22789002770865E+00, -2.07127435811125E+00)
-X( 5) = (  1.11182382946579E+00,  1.91784047471523E-01)
-X( 6) = (  3.68368798447795E-01, -5.78849443787668E-01)
-X( 7) = ( -1.37945707030438E+00,  1.76735543503195E+00)
-X( 8) = (  1.94659755754041E+00,  1.25243707470597E+00)
-
-X( 9) = ( -9.03057723105570E-02,  1.54262444068594E-01)
-
-PATH NUMBER =        79
-
-ARCLEN =  1.91306899160630E+01
-NFE =  236
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.64335853528224E-13
-
-X( 1) = ( -5.93549067818297E+00, -2.47787450202875E+01)
-X( 2) = (  1.15235826122628E+01,  1.70476422520850E+01)
-X( 3) = ( -1.18492812536108E+13, -1.56400951798371E+13)
-X( 4) = ( -1.56400951798373E+13,  1.18492812536109E+13)
-X( 5) = ( -5.85034127626832E+14, -1.25390295311276E+15)
-X( 6) = ( -1.25390295311276E+15,  5.85034127626832E+14)
-X( 7) = ( -2.70403083053514E+00,  3.59427316829752E-01)
-X( 8) = ( -2.97919024688522E-02, -8.14485755875069E-01)
-
-X( 9) = ( -6.46968847310518E-16,  4.44143419958687E-16)
-
-PATH NUMBER =        80
-
-ARCLEN =  1.26066572096499E+01
-NFE =  234
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.88753665862540E-17
-
-X( 1) = ( -8.45196877409835E-01, -7.92235415426022E-01)
-X( 2) = (  1.12566385494450E+00, -5.94844452320603E-01)
-X( 3) = ( -3.54281084626983E-01, -8.41957515842724E-02)
-X( 4) = ( -9.39458343171758E-01,  3.17512345375024E-02)
-X( 5) = ( -1.16156403958416E+00, -1.51629198529726E+00)
-X( 6) = (  1.72860198938114E+00, -1.01889865593729E+00)
-X( 7) = ( -9.87295286067430E-01,  5.58588121492143E-03)
-X( 8) = ( -1.62572967705491E-01, -3.39227011099107E-02)
-
-X( 9) = ( -1.19095208166268E-02,  4.12095648147829E-01)
-
-PATH NUMBER =        81
-
-ARCLEN =  1.69416657641662E+01
-NFE =  163
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.80438205984803E-13
-
-X( 1) = ( -1.61255327488814E+12, -3.67252185562303E+13)
-X( 2) = ( -3.67252185562306E+13,  1.61255327488785E+12)
-X( 3) = ( -2.63207390228612E-01,  2.02136466229324E-01)
-X( 4) = (  9.87844855471567E-01,  7.75414216492210E-02)
-X( 5) = (  3.20889165009978E+13,  1.79224186605108E+13)
-X( 6) = ( -1.79224186605109E+13,  3.20889165009974E+13)
-X( 7) = (  5.53578373584379E-01, -1.73465642111360E-01)
-X( 8) = ( -8.40991897506544E-01, -1.35143497653365E-01)
-
-X( 9) = (  3.44958318230755E-14, -8.38418960993903E-15)
-
-PATH NUMBER =        82
-
-ARCLEN =  6.03563476451449E+00
-NFE =  141
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.90198603332630E-13
-
-X( 1) = ( -4.48420631017371E+00, -3.65957948624337E+00)
-X( 2) = (  2.74001897977198E+00,  3.53265620567343E+00)
-X( 3) = (  1.17022966518609E+14, -7.82107528744407E+12)
-X( 4) = (  7.82107528744658E+12,  1.17022966518608E+14)
-X( 5) = (  1.18724015816834E+15,  1.15828850704421E+15)
-X( 6) = ( -1.15828850704421E+15,  1.18724015816834E+15)
-X( 7) = ( -2.26992123110190E+00, -5.02234399854472E-01)
-X( 8) = ( -5.16414961495238E-02,  3.58732118796547E-01)
-
-X( 9) = (  1.16257474296316E-15, -1.27502175484295E-16)
-
-PATH NUMBER =        83
-
-ARCLEN =  8.81178154241476E+00
-NFE =  183
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.58579521751284E-14
-
-X( 1) = ( -1.17580884606009E+00, -3.91945730962496E-01)
-X( 2) = (  6.00333423169067E-01, -7.67662168813450E-01)
-X( 3) = ( -4.46316901221448E-01,  4.48073453469258E-02)
-X( 4) = ( -8.96273829690024E-01, -2.23126848790954E-02)
-X( 5) = ( -1.71041655462021E+00,  8.19910369153632E-01)
-X( 6) = (  9.53617690809548E-01,  1.47059799982801E+00)
-X( 7) = ( -9.69616408977239E-01,  9.02774498394692E-03)
-X( 8) = ( -2.47341824528418E-01, -3.53900909770472E-02)
-
-X( 9) = ( -3.32167220837337E-01,  6.84410179974987E-01)
-
-PATH NUMBER =        84
-
-ARCLEN =  1.47209244151349E+02
-NFE =  318
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.14905545442244E-14
-
-X( 1) = ( -8.01563642853412E-01, -4.27103037978950E-01)
-X( 2) = (  8.40201275122201E-01, -4.07462208321897E-01)
-X( 3) = ( -3.63818630922037E+00, -3.13016201582223E+00)
-X( 4) = (  3.19905480977628E+00, -3.55983666075496E+00)
-X( 5) = (  1.08100630676358E+00,  8.35636949104229E-02)
-X( 6) = (  2.00993027177776E-01, -4.49432910599152E-01)
-X( 7) = (  6.88801025267257E-01, -3.94152999316654E+00)
-X( 8) = ( -4.06296944890420E+00, -6.68213220541687E-01)
-
-X( 9) = (  3.26487150138626E-01,  1.50106266364272E-01)
-
-PATH NUMBER =        85
-
-ARCLEN =  1.23698705648576E+01
-NFE =  214
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.26164256976332E-12
-
-X( 1) = ( -1.36159268158275E+00,  2.36362158490535E+01)
-X( 2) = (  8.39647360428023E+00, -1.69811920446138E+01)
-X( 3) = (  6.13355643621388E+11, -7.34375351682828E+11)
-X( 4) = (  7.34375351683121E+11,  6.13355643622422E+11)
-X( 5) = (  1.38387618194877E+13, -1.14527134985573E+14)
-X( 6) = ( -1.14527134985573E+14, -1.38387618194876E+13)
-X( 7) = ( -2.49079421637040E+00,  1.63140702115184E+00)
-X( 8) = ( -2.82748096093752E-01, -9.87435562079106E-01)
-
-X( 9) = ( -3.46290955166671E-15,  8.72452067188223E-15)
-
-PATH NUMBER =        86
-
-ARCLEN =  8.82055488966208E+00
-NFE =  174
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32586167382614E-13
-
-X( 1) = (  7.52803337980592E+00, -1.89083021062830E+01)
-X( 2) = ( -3.80755698636988E-01,  1.67030319080926E+01)
-X( 3) = (  1.92042355810494E+12,  4.81243565204385E+13)
-X( 4) = (  4.81243565204385E+13, -1.92042355810432E+12)
-X( 5) = (  5.56827372927790E+14, -3.37314944592865E+15)
-X( 6) = ( -3.37314944592866E+15, -5.56827372927790E+14)
-X( 7) = ( -1.86390598108127E+00, -3.37347135818029E-01)
-X( 8) = (  9.94867137454541E-02, -5.60057920796059E-01)
-
-X( 9) = ( -9.71699256431188E-17,  2.97776126673144E-16)
-
-PATH NUMBER =        87
-
-ARCLEN =  1.31992486369962E+01
-NFE =  160
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.66549170166879E-13
-
-X( 1) = (  1.63342222264173E+15, -1.45241674109934E+15)
-X( 2) = ( -1.45241674109934E+15, -1.63342222264173E+15)
-X( 3) = (  1.17211548411937E-01,  2.91363681360427E-01)
-X( 4) = (  3.74392701810970E-01,  2.67833329475704E+00)
-X( 5) = ( -5.10310343973078E+00, -4.67852036743862E+00)
-X( 6) = ( -1.09653747716940E+00,  1.80259211222660E+00)
-X( 7) = ( -6.46996414079708E+14,  4.94157315119121E+14)
-X( 8) = ( -4.94157315119121E+14, -6.46996414079708E+14)
-
-X( 9) = ( -8.60097583432751E-16,  8.95225733821281E-16)
-
-PATH NUMBER =        88
-
-ARCLEN =  1.20831757617676E+01
-NFE =  179
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.00959721895867E-16
-
-X( 1) = ( -1.78654801865819E-02,  2.42461036816493E-01)
-X( 2) = (  1.02882744214239E+00,  4.21031037065449E-03)
-X( 3) = ( -3.32182462985672E+00, -2.10811115213516E+00)
-X( 4) = ( -2.17826339358013E+00,  3.21484333266449E+00)
-X( 5) = (  1.09509784985601E+00,  4.19501638508673E-02)
-X( 6) = (  1.00815582087483E-01, -4.55678906801469E-01)
-X( 7) = (  2.99182814752126E+00,  1.24565781632954E+00)
-X( 8) = (  1.30852462014193E+00, -2.84808864862651E+00)
-
-X( 9) = ( -1.06985641586237E-01, -1.31593792687055E-01)
-
-PATH NUMBER =        89
-
-ARCLEN =  1.52036278370707E+01
-NFE =  178
-IFLAG2 = 11
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.36764298970791E-13
-
-X( 1) = (  1.47834492202225E+14,  2.17429842053196E+14)
-X( 2) = (  2.17429842053196E+14, -1.47834492202224E+14)
-X( 3) = ( -7.11242030126658E-01,  2.67998406255228E-01)
-X( 4) = (  8.55266411304763E-01,  2.43443021419766E-01)
-X( 5) = (  1.87017537692467E+14,  1.73063231701843E+14)
-X( 6) = (  1.73063231701843E+14, -1.87017537692467E+14)
-X( 7) = (  2.53659820432999E-01,  2.19305851773738E-01)
-X( 8) = ( -9.30341348434911E-01,  9.02880412787651E-02)
-
-X( 9) = (  7.68552803592348E-15, -1.80535924751424E-15)
-
-PATH NUMBER =        90
-
-ARCLEN =  7.09100058103299E+00
-NFE =  188
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32275884815543E-13
-
-X( 1) = (  2.37032142806010E+00, -1.84645418343696E+00)
-X( 2) = ( -2.37536967052743E-01,  1.21477037442691E+00)
-X( 3) = ( -1.00590153435991E+13,  2.01840286936597E+13)
-X( 4) = ( -2.01840286936590E+13, -1.00590153435920E+13)
-X( 5) = ( -3.13697907902841E+14, -2.71865484948927E+15)
-X( 6) = ( -2.71865484948927E+15,  3.13697907902841E+14)
-X( 7) = ( -9.34905109376326E-01, -3.70905496999801E+00)
-X( 8) = (  1.06548037044556E+00, -3.91611013060929E-01)
-
-X( 9) = ( -2.30570838572093E-16,  3.17671236538253E-16)
-
-PATH NUMBER =        91
-
-ARCLEN =  8.45706911333569E+00
-NFE =  103
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.99246168515537E-17
-
-X( 1) = (  1.32486380980226E+00, -1.59173912287482E-01)
-X( 2) = ( -2.37794058724458E-01, -8.86833577699621E-01)
-X( 3) = (  2.96311243351956E+00,  1.56100702523028E+00)
-X( 4) = ( -1.63399050229237E+00,  2.83076267504741E+00)
-X( 5) = (  9.91495870569985E-01,  1.35486485840605E-01)
-X( 6) = (  3.91324176491086E-01, -3.43281349068548E-01)
-X( 7) = (  6.78575243485830E-02,  2.51310594170734E+00)
-X( 8) = (  2.70463905111499E+00, -6.30520910210449E-02)
-
-X( 9) = ( -1.38962844793605E-01,  6.84250221506060E-01)
-
-PATH NUMBER =        92
-
-ARCLEN =  1.09796497440048E+01
-NFE =  139
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.84709871471573E-14
-
-X( 1) = (  1.16805813859717E+00,  2.64606830344745E-01)
-X( 2) = (  4.41763649679228E-01, -6.99641452928516E-01)
-X( 3) = (  2.18650479698327E+00,  2.11047855621080E+00)
-X( 4) = ( -2.22789002770872E+00,  2.07127435811130E+00)
-X( 5) = (  1.11182382946579E+00, -1.91784047471488E-01)
-X( 6) = (  3.68368798447798E-01,  5.78849443787704E-01)
-X( 7) = ( -1.37945707030441E+00, -1.76735543503200E+00)
-X( 8) = (  1.94659755754049E+00, -1.25243707470592E+00)
-
-X( 9) = (  2.68637857924879E-01, -1.43507962846206E-02)
-
-PATH NUMBER =        93
-
-ARCLEN =  3.09003599599314E+00
-NFE =  130
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.07403598784198E-13
-
-X( 1) = (  6.00254310064938E+13, -7.12525373689938E+12)
-X( 2) = ( -7.12525373689931E+12, -6.00254310064938E+13)
-X( 3) = ( -6.39681384453772E-01,  2.27045057467667E-01)
-X( 4) = (  2.16082298224758E-02,  3.17333623535367E+00)
-X( 5) = ( -2.43008623297068E+00, -7.02709382821027E+00)
-X( 6) = ( -1.76823798864890E+00,  1.22713609051397E+00)
-X( 7) = (  2.24929565095073E+13, -9.81297320930841E+11)
-X( 8) = (  9.81297320931134E+11,  2.24929565095076E+13)
-
-X( 9) = ( -6.78592652989668E-15, -1.33647975499029E-14)
-
-PATH NUMBER =        94
-
-ARCLEN =  2.16699146327543E+01
-NFE =  182
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.58534530925929E-16
-
-X( 1) = (  1.52882796872256E+00, -5.93006252708744E-01)
-X( 2) = ( -7.34212672558201E-01, -1.23479827937268E+00)
-X( 3) = ( -6.27822700511963E-01,  2.57790977457448E-01)
-X( 4) = (  8.42157099175799E-01,  1.92181515531187E-01)
-X( 5) = (  1.34052542652374E+00, -1.04876828069925E+00)
-X( 6) = ( -1.25119464901040E+00, -1.12364654685895E+00)
-X( 7) = (  7.03035713465316E-01,  2.44536619572995E-01)
-X( 8) = ( -7.83389442654810E-01,  2.19454038373671E-01)
-
-X( 9) = (  9.01352414846785E-02,  7.43220659600268E-01)
-
-PATH NUMBER =        95
-
-ARCLEN =  1.03240014865303E+01
-NFE =  126
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.09262915862347E-13
-
-X( 1) = ( -7.56891911527586E+00, -2.12925390582321E+01)
-X( 2) = (  1.13816212347141E+01,  1.39414001204359E+01)
-X( 3) = ( -1.73912657124921E+14,  2.10452058340543E+14)
-X( 4) = (  2.10452058340542E+14,  1.73912657124921E+14)
-X( 5) = ( -1.99191963965711E+15, -1.92573814462200E+15)
-X( 6) = (  1.92573814462200E+15, -1.99191963965711E+15)
-X( 7) = ( -2.77625588563020E+00, -1.23029718318773E+00)
-X( 8) = ( -1.99120614241359E-01,  8.32110801983724E-01)
-
-X( 9) = ( -1.21818753814808E-15, -9.86623976961809E-17)
-
-PATH NUMBER =        96
-
-ARCLEN =  5.66104570528832E+01
-NFE =  261
-IFLAG2 = 11
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.94020848839535E-17
-
-X( 1) = (  1.32486380980226E+00,  1.59173912287483E-01)
-X( 2) = ( -2.37794058724459E-01,  8.86833577699619E-01)
-X( 3) = (  2.96311243351955E+00, -1.56100702523028E+00)
-X( 4) = ( -1.63399050229237E+00, -2.83076267504741E+00)
-X( 5) = (  9.91495870569984E-01, -1.35486485840604E-01)
-X( 6) = (  3.91324176491085E-01,  3.43281349068547E-01)
-X( 7) = (  6.78575243485840E-02, -2.51310594170734E+00)
-X( 8) = (  2.70463905111498E+00,  6.30520910210459E-02)
-
-X( 9) = ( -1.43433624721953E-01,  6.04344116826302E-01)
-
-
-Testing optional arguments.
-
-PATH NUMBER =        13
-
-ARCLEN =  3.46511902044757E+01
-NFE =  214
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.63558475319777E-09
-
-X( 1) = ( -5.29659403991598E+00, -1.31501113437955E+01)
-X( 2) = (  1.48509186708256E+01,  1.61536320533026E+01)
-X( 3) = ( -8.97836847768270E+08,  1.29250506227937E+09)
-X( 4) = (  1.40998204242802E+09,  9.79442068995038E+08)
-X( 5) = (  6.30672806757068E+09,  4.59158142206215E+09)
-X( 6) = ( -6.21228720998800E+09,  8.53283487952730E+09)
-X( 7) = ( -2.58170717608609E+00, -2.05412400748032E+00)
-X( 8) = ( -4.80117746845127E-01,  8.06609131136098E-01)
-
-X( 9) = (  9.25347989947739E-11,  7.99589588333996E-12)
-
-
-Statistics for retracked path.
-
-PATH NUMBER =        13
-
-ARCLEN =  3.46914922497874E+01
-NFE =  311
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.97702320676375E-14
-
-X( 1) = ( -2.91607811597172E-01, -5.88777666914554E+00)
-X( 2) = (  3.50420199338155E+00,  7.51763180332918E+00)
-X( 3) = (  4.63964414952696E+14, -2.35712455497318E+14)
-X( 4) = ( -2.57136578515518E+14, -5.06134569605923E+14)
-X( 5) = ( -1.11714966211514E+15, -2.32523041390926E+15)
-X( 6) = (  3.14597473780523E+15, -1.51147369926800E+15)
-X( 7) = ( -2.86206435876404E-01, -1.33554351375132E+00)
-X( 8) = ( -3.19076088855085E-01,  8.22391561774205E-02)
-
-X( 9) = ( -2.57884262989255E-16,  1.11293353005637E-16)
diff --git a/sandbox/801/Drivers/global_plp.mod b/sandbox/801/Drivers/global_plp.mod
deleted file mode 100644
index e9ee890..0000000
--- a/sandbox/801/Drivers/global_plp.mod
+++ /dev/null
@@ -1,130 +0,0 @@
-GFORTRAN module version '0' created from ../Src/polsys_plp.f90 on Fri Dec 10 14:57:50 2010
-MD5:15d703b13eedb57d74a820baa17624c3 -- If you edit this, you'll get what you deserve.
-
-(() () () () () () () () () () () () () () () ()
-() () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'c' 'global_plp' 'c' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 3 0 (4 5) () 2 () () () 0 0)
-6 'd' 'global_plp' 'd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 7 0 (8 9 10) () 6 () () ()
-0 0)
-11 'global_plp' 'global_plp' 'global_plp' 1 ((MODULE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 ()
-() () 0 0)
-12 'large' 'global_plp' 'large' 1 ((PARAMETER UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-13 'numt' 'global_plp' 'numt' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 14 0 (15) () 13 () ()
-() 0 0)
-16 'numv' 'global_plp' 'numv' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 17 0 (18 19) () 16 ()
-() () 0 0)
-20 'par' 'global_plp' 'par' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 21 0 (22 23 24) () 20
-() () () 0 0)
-25 'partition' 'global_plp' 'partition' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 26 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-27 'partition_sizes' 'global_plp' 'partition_sizes' 1 ((VARIABLE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-26 'partition_type' 'global_plp' 'partition_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((28 'set' (DERIVED 29 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-30 'pi' 'global_plp' 'pi' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (REAL 8 0 0 REAL ()) 0 0 () (CONSTANT (REAL 8 0 0
-REAL ()) 0 '0.3243f6a8885a30@1') () 0 () () () 0 0)
-31 'polynomial' 'global_plp' 'polynomial' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 32 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-32 'polynomial_type' 'global_plp' 'polynomial_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((33 'term' (DERIVED 34 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ()) (35 'num_terms' (INTEGER 4 0 0
-INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN)
-UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-36 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-37 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-38 'sc' 'global_plp' 'sc' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 39 0 (40 41 42) () 38 () ()
-() 0 0)
-43 'sd' 'global_plp' 'sd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 44 0 (45 46) () 43 () () ()
-0 0)
-47 'selected_int_kind' '(intrinsic)' 'selected_int_kind' 1 ((PROCEDURE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 47 () () () 0 0)
-29 'set_type' 'global_plp' 'set_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((48 'index' (INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER)
-UNKNOWN-ACCESS ()) (49 'num_indices' (INTEGER 4 0 0 INTEGER ()) () (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ())
-(50 'set_deg' (INTEGER 4 0 0 INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (51 'start_coef' (
-COMPLEX 8 0 0 COMPLEX ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-34 'term_type' 'global_plp' 'term_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((52 'coef' (COMPLEX 8 0 0 COMPLEX ()) () (UNKNOWN-FL
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (53 'deg'
-(INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-4 'i' '' 'i' 3 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-5 'j' '' 'j' 3 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-8 'i' '' 'i' 7 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-9 'j' '' 'j' 7 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-10 'k' '' 'k' 7 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-15 'i' '' 'i' 14 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-22 'i' '' 'i' 21 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-23 'j' '' 'j' 21 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-24 'k' '' 'k' 21 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-41 'j' '' 'j' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-40 'i' '' 'i' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-42 'k' '' 'k' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-45 'i' '' 'i' 44 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-46 'j' '' 'j' 44 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-18 'i' '' 'i' 17 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-19 'j' '' 'j' 17 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-)
-
-('c' 0 2 'd' 0 6 'global_plp' 0 11 'large' 0 12 'numt' 0 13 'numv' 0 16
-'par' 0 20 'partition' 0 25 'partition_sizes' 0 27 'partition_type' 0 26
-'pi' 0 30 'polynomial' 0 31 'polynomial_type' 0 32 'r8' 0 36
-'real_precision' 0 37 'sc' 0 38 'sd' 0 43 'selected_int_kind' 0 47
-'set_type' 0 29 'term_type' 0 34)
diff --git a/sandbox/801/Drivers/homotopy.mod b/sandbox/801/Drivers/homotopy.mod
deleted file mode 100644
index c4005cc..0000000
--- a/sandbox/801/Drivers/homotopy.mod
+++ /dev/null
@@ -1,131 +0,0 @@
-GFORTRAN module version '0' created from ../Src/polsys_plp.f90 on Fri Dec 10 14:57:50 2010
-MD5:9a28529b67f8effc2312d2ca8870c200 -- If you edit this, you'll get what you deserve.
-
-(() () () () () ()
-() () () () () () () () () () () () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'colpos' 'hompack90_global' 'colpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-3 'f' 'homotopy' 'f' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC BODY
-UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN ())
-4 0 (5 6) () 0 () () () 0 0)
-7 'fjac' 'homotopy' 'fjac' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC BODY
-UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN ())
-8 0 (9 10 11) () 0 () () () 0 0)
-12 'fjacs' 'homotopy' 'fjacs' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 13 0 (14) () 0 () () () 0 0)
-15 'homotopy' 'homotopy' 'homotopy' 1 ((MODULE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 ()
-() () 0 0)
-16 'hompack90_global' 'hompack90_global' 'hompack90_global' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-17 'ipar' 'hompack90_global' 'ipar' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-18 'par' 'hompack90_global' 'par' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-19 'pp' 'hompack90_global' 'pp' 1 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-20 'qrsparse' 'hompack90_global' 'qrsparse' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-21 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-22 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-23 'rho' 'homotopy' 'rho' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC BODY
-UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN ())
-24 0 (25 26 27 28) () 0 () () () 0 0)
-29 'rhoa' 'homotopy' 'rhoa' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 30 0 (31 32 33) () 0 () () () 0 0)
-34 'rhojac' 'homotopy' 'rhojac' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 35 0 (36 37 38 39 40) () 0 () () () 0 0)
-41 'rhojs' 'homotopy' 'rhojs' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 42 0 (43 44 45) () 0 () () () 0 0)
-46 'rowpos' 'hompack90_global' 'rowpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-47 'selected_real_kind' '(intrinsic)' 'selected_real_kind' 1 ((
-PROCEDURE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4
-0 0 REAL ()) 0 0 () () 47 () () () 0 0)
-9 'x' '' 'x' 8 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-10 'v' '' 'v' 8 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-11 'k' '' 'k' 8 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-33 'x' '' 'x' 30 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-32 'lambda' '' 'lambda' 30 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-5 'x' '' 'x' 4 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-6 'v' '' 'v' 4 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-39 'v' '' 'v' 35 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-40 'k' '' 'k' 35 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-14 'x' '' 'x' 13 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-36 'a' '' 'a' 35 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-37 'lambda' '' 'lambda' 35 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-38 'x' '' 'x' 35 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-26 'lambda' '' 'lambda' 24 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-27 'x' '' 'x' 24 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-28 'v' '' 'v' 24 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-31 'a' '' 'a' 30 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-25 'a' '' 'a' 24 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-43 'a' '' 'a' 42 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-44 'lambda' '' 'lambda' 42 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-45 'x' '' 'x' 42 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-)
-
-('colpos' 0 2 'f' 0 3 'fjac' 0 7 'fjacs' 0 12 'homotopy' 0 15
-'hompack90_global' 0 16 'ipar' 0 17 'par' 0 18 'pp' 0 19 'qrsparse' 0 20
-'r8' 0 21 'real_precision' 0 22 'rho' 0 23 'rhoa' 0 29 'rhojac' 0 34
-'rhojs' 0 41 'rowpos' 0 46 'selected_real_kind' 0 47)
diff --git a/sandbox/801/Drivers/hompack90_global.mod b/sandbox/801/Drivers/hompack90_global.mod
deleted file mode 100644
index 7cd0223..0000000
--- a/sandbox/801/Drivers/hompack90_global.mod
+++ /dev/null
@@ -1,49 +0,0 @@
-GFORTRAN module version '0' created from ../Src/polsys_plp.f90 on Fri Dec 10 14:57:50 2010
-MD5:23af6302102066cb2c19b15dcb9683f2 -- If you edit this, you'll get what you deserve.
-
-(() () () () () () ()
-() () () () () () () () () () () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'colpos' 'hompack90_global' 'colpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-3 'hompack90_global' 'hompack90_global' 'hompack90_global' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-4 'ipar' 'hompack90_global' 'ipar' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-5 'par' 'hompack90_global' 'par' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-6 'pp' 'hompack90_global' 'pp' 1 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-7 'qrsparse' 'hompack90_global' 'qrsparse' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-8 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-9 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-10 'rowpos' 'hompack90_global' 'rowpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-11 'selected_real_kind' '(intrinsic)' 'selected_real_kind' 1 ((
-PROCEDURE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4
-0 0 REAL ()) 0 0 () () 11 () () () 0 0)
-)
-
-('colpos' 0 2 'hompack90_global' 0 3 'ipar' 0 4 'par' 0 5 'pp' 0 6
-'qrsparse' 0 7 'r8' 0 8 'real_precision' 0 9 'rowpos' 0 10
-'selected_real_kind' 0 11)
diff --git a/sandbox/801/Drivers/main_template b/sandbox/801/Drivers/main_template
deleted file mode 100755
index c05dae6..0000000
Binary files a/sandbox/801/Drivers/main_template and /dev/null differ
diff --git a/sandbox/801/Drivers/main_template.f90 b/sandbox/801/Drivers/main_template.f90
deleted file mode 100644
index 59229c9..0000000
--- a/sandbox/801/Drivers/main_template.f90
+++ /dev/null
@@ -1,357 +0,0 @@
-! This file contains a sample main program and user written subroutine
-! for the POLSYS_PLP package.  Layne T. Watson, Steven M. Wise, Andrew
-! J. Sommese, August, 1998.  Cosmetic changes, 10/1999.
-
-PROGRAM MAIN_TEMPLATE
-!
-! MAIN_TEMPLATE is a template for calling BEZOUT_PLP and POLSYS_PLP.
-! There are two options provided by MAIN_TEMPLATE:  (1) MAIN_TEMPLATE
-! returns only the generalized PLP Bezout number ("root count") of the
-! target polynomial system based on a system partition provided by the
-! user (calls BEZOUT_PLP) or (2) MAIN_TEMPLATE returns the root count,
-! homotopy path tracking statistics, error flags, and the roots (calls
-! POLSYS_PLP).  For the first option set the logical switch
-! ROOT_COUNT_ONLY = .TRUE., and for the second option set ROOT_COUNT_ONLY
-! = .FALSE..
-! 
-! The file INPUT.DAT contains data for several sample target systems
-! and system partitions.  This main program illustrates how to find the
-! root count for several different partitions for the same polynomial
-! system, and also how to solve more than one polynomial system in the
-! same run.  The data is read in using NAMELISTs, which makes the data
-! file INPUT.DAT self-explanatory.  The problem definition is given in
-! the NAMELIST /PROBLEM/ and the PLP system partition is defined in the
-! NAMELIST /SYSPARTITION/.  A new polynomial system definition is
-! signalled by setting the variable NEW_PROBLEM=.TRUE. in the /PROBLEM/
-! namelist.  Thus a data file describing several different polynomial
-! systems to solve, and exploring different system partitions for the
-! same polynomial system, might look like
-! 
-! &PROBLEM NEW_PROBLEM=.TRUE.  data  /
-! &SYSPARTITION ROOT_COUNT_ONLY=.FALSE.  data  /  finds roots
-! 
-! &PROBLEM NEW_PROBLEM=.TRUE.  data  /
-! &SYSPARTITION ROOT_COUNT_ONLY=.TRUE.  data  /  finds root count only
-! &PROBLEM NEW_PROBLEM=.FALSE.  /
-! &SYSPARTITION ROOT_COUNT_ONLY=.TRUE.  data  /  a different root count
-! &PROBLEM NEW_PROBLEM=.FALSE.  /
-! &SYSPARTITION ROOT_COUNT_ONLY=.TRUE.  data  /  another root count
-! 
-! Note that static arrays are used below only to support NAMELIST input;
-! the actual storage of the polynomial system and partition information
-! in the data structures in the module GLOBAL_PLP is very compact.
-
-
-USE POLSYS
-
-! Local variables.
-IMPLICIT NONE
-INTEGER, PARAMETER:: NN = 30, MMAXT = 500
-INTEGER:: BPLP, I, IFLAG1, J, K, M, MAXT, N, NUMRR = 1
-INTEGER, DIMENSION(NN):: NUM_TERMS, NUM_SETS
-INTEGER, DIMENSION(NN,NN):: NUM_INDICES
-INTEGER, DIMENSION(NN,NN,NN):: INDEX
-INTEGER, DIMENSION(NN,MMAXT,NN):: DEG
-INTEGER, DIMENSION(:), POINTER:: IFLAG2, NFE
-REAL (KIND=R8):: TRACKTOL, FINALTOL, SINGTOL
-REAL (KIND=R8), DIMENSION(8):: SSPAR
-REAL (KIND=R8), DIMENSION(NN):: SCALE_FACTORS
-REAL (KIND=R8), DIMENSION(:), POINTER:: ARCLEN, LAMBDA
-COMPLEX (KIND=R8), DIMENSION(NN,MMAXT):: COEF
-COMPLEX (KIND=R8), DIMENSION(:,:), POINTER:: ROOTS
-CHARACTER (LEN=80):: TITLE
-CHARACTER (LEN=80), DIMENSION(NN):: P
-LOGICAL:: NEW_PROBLEM, NO_SCALING, RECALL, ROOT_COUNT_ONLY, USER_F_DF
-
-NAMELIST /PROBLEM/ COEF, DEG, FINALTOL, NEW_PROBLEM, N, NUMRR, NUM_TERMS,  &
-  SINGTOL, SSPAR, TITLE, TRACKTOL
-NAMELIST /SYSPARTITION/ INDEX, NUM_INDICES, NUM_SETS, P, ROOT_COUNT_ONLY
-
-NULLIFY(IFLAG2, NFE, ARCLEN, LAMBDA, ROOTS) ! Disassociate pointers.
-
-! MAIN_TEMPLATE reads the target polynomial system definition and the
-! system partition specification from the file INPUT.DAT.
-
-OPEN (UNIT=3,FILE='INPUT.DAT',ACTION='READ',POSITION='REWIND',   &
-     DELIM='APOSTROPHE',STATUS='OLD')
-
-! All output is to the file OUTPUT.DAT, which is overwritten.
-
-OPEN (UNIT=7,FILE='OUTPUT.DAT',ACTION='WRITE',STATUS='REPLACE',DELIM='NONE')
-
-SSPAR(1:8) = 0.0_R8 ; DEG = 0 ; COEF = (0.0_R8,0.0_R8)
-
-MAIN_LOOP: &
-DO
-
-  READ (3,NML=PROBLEM,END=500)
-
-  IF (NEW_PROBLEM) THEN
-    WRITE (7,190) TITLE,TRACKTOL,FINALTOL,SINGTOL,SSPAR(5),N
-    190 FORMAT(///A80//'TRACKTOL, FINALTOL =',2ES22.14, &
-      /,'SINGTOL (0 SETS DEFAULT) =',ES22.14, &
-      /,'SSPAR(5) (0 SETS DEFAULT) =',ES22.14, &
-      /,'NUMBER OF EQUATIONS =',I3)
-    WRITE (7,200)
-    200 FORMAT(/'****** COEFFICIENT TABLEAU ******')
-    DO I=1,N
-      WRITE (7,210) I,NUM_TERMS(I)
-      210 FORMAT(/,'POLYNOMIAL(',I2,')%NUM_TERMS =',I3)
-      DO J=1,NUM_TERMS(I)
-        WRITE (7,220) (I,J,K,DEG(I,J,K), K=1,N)
-        220 FORMAT('POLYNOMIAL(',I2,')%TERM(',I2,')%DEG(',I2,') =',I2)
-        WRITE (7,230) I,J,COEF(I,J)
-        230 FORMAT('POLYNOMIAL(',I2,')%TERM(',I2,')%COEF = (',ES22.14, &
-            ',',ES22.14,')')
-      END DO
-    END DO
-
-    ! Allocate storage for the target system in POLYNOMIAL.
-
-    CALL CLEANUP_POL
-    ALLOCATE(POLYNOMIAL(N))
-    DO I=1,N
-      POLYNOMIAL(I)%NUM_TERMS = NUM_TERMS(I)
-      ALLOCATE(POLYNOMIAL(I)%TERM(NUM_TERMS(I)))
-      DO J=1,NUM_TERMS(I)
-        ALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG(N+1))
-        POLYNOMIAL(I)%TERM(J)%COEF = COEF(I,J) 
-        POLYNOMIAL(I)%TERM(J)%DEG(1:N) = DEG(I,J,1:N)
-      END DO
-    END DO
-  END IF
-
-  READ (3,NML=SYSPARTITION)
-
-  ! Allocate storage for the system partition in PARTITION. 
-
-  CALL CLEANUP_PAR
-  ALLOCATE(PARTITION_SIZES(N))
-  PARTITION_SIZES(1:N) = NUM_SETS(1:N)
-  ALLOCATE(PARTITION(N))
-  DO I=1,N
-    ALLOCATE(PARTITION(I)%SET(PARTITION_SIZES(I)))
-    DO J=1,PARTITION_SIZES(I)
-      PARTITION(I)%SET(J)%NUM_INDICES = NUM_INDICES(I,J)
-      ALLOCATE(PARTITION(I)%SET(J)%INDEX(NUM_INDICES(I,J)))
-      PARTITION(I)%SET(J)%INDEX(1:NUM_INDICES(I,J)) = &
-        INDEX(I,J,1:NUM_INDICES(I,J))
-    END DO 
-  END DO
-
-  IF (ROOT_COUNT_ONLY) THEN
-
-    ! Compute only the PLP Bezout number BPLP for this partition.
-
-    MAXT = MAXVAL(NUM_TERMS(1:N))
-    CALL BEZOUT_PLP(N,MAXT,SINGTOL,BPLP)
-  ELSE
-
-    ! Compute all BPLP roots of the target polynomial system.
-
-    CALL POLSYS_PLP(N,TRACKTOL,FINALTOL,SINGTOL,SSPAR,BPLP,IFLAG1,IFLAG2, &
-      ARCLEN,LAMBDA,ROOTS,NFE,SCALE_FACTORS)
-  END IF
-
-  WRITE (7,240) BPLP, (K,TRIM(P(K)),K=1,N)
-  240 FORMAT(//,'GENERALIZED PLP BEZOUT NUMBER (BPLP) =',I10, &
-    /'BASED ON THE FOLLOWING SYSTEM PARTITION:',/('P(',I2,') = ',A))
-
-  IF (.NOT. ROOT_COUNT_ONLY) THEN
-    DO M=1,BPLP
-      WRITE (7,260) M,ARCLEN(M),NFE(M),IFLAG2(M)
-      260 FORMAT(/'PATH NUMBER =',I10//'ARCLEN =',ES22.14/'NFE =',I5/ &
-        'IFLAG2 =',I3)
-
-      ! Designate solutions as "REAL" or "COMPLEX."
-
-      IF (ANY(ABS(AIMAG(ROOTS(1:N,M))) >= 1.0E-4_R8)) THEN
-        WRITE (7,270,ADVANCE='NO')
-        270 FORMAT('COMPLEX, ')
-      ELSE
-        WRITE (7,280,ADVANCE='NO')
-        280 FORMAT('REAL, ')
-      END IF
-
-      ! Designate solutions as "FINITE" or "INFINITE."
-
-      IF (ABS(ROOTS(N+1,M)) < 1.0E-6_R8) THEN
-        WRITE (7,290)
-        290 FORMAT('INFINITE SOLUTION')
-      ELSE
-        WRITE (7,300)
-        300 FORMAT('FINITE SOLUTION')
-      END IF
-      IF (MOD(IFLAG2(M),10) == 1) THEN
-        WRITE (7,310) 1.0_R8,LAMBDA(M)
-        310 FORMAT('LAMBDA =',ES22.14,', ESTIMATED ERROR =',ES22.14/)
-      ELSE
-        WRITE (7,315) LAMBDA(M)
-        315 FORMAT('LAMBDA =',ES22.14/)
-      END IF
-      WRITE (7,320) (J,ROOTS(J,M),J=1,N)
-      320 FORMAT(('X(',I2,') = (',ES22.14,',',ES22.14,')'))
-      WRITE (7,330) N + 1, ROOTS(N+1,M)
-      330 FORMAT(/,'X(',I2,') = (',ES22.14,',',ES22.14,')')
-    END DO
-  END IF
-
-END DO MAIN_LOOP
-
-500 CALL TEST_OPTIONS ! This tests various options, and is not part of a
-                      ! typical main program.
-CLOSE (UNIT=3) ; CLOSE (UNIT=7)
-CALL CLEANUP_POL
-CALL CLEANUP_PAR
-STOP
-
-CONTAINS
-
-SUBROUTINE CLEANUP_POL
-
-! Deallocates structure POLYNOMIAL.
-
-IF (.NOT. ALLOCATED(POLYNOMIAL)) RETURN
-DO I=1,SIZE(POLYNOMIAL)
-  DO J=1,NUMT(I)
-    DEALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG)
-  END DO
-  DEALLOCATE(POLYNOMIAL(I)%TERM)
-END DO
-DEALLOCATE(POLYNOMIAL)
-RETURN
-END SUBROUTINE CLEANUP_POL
-
-SUBROUTINE CLEANUP_PAR
-
-! Deallocates structure PARTITION.
-
-IF (.NOT. ALLOCATED(PARTITION)) RETURN
-DO I=1,SIZE(PARTITION)
-  DO J=1,PARTITION_SIZES(I)
-    DEALLOCATE(PARTITION(I)%SET(J)%INDEX)
-  END DO
-  DEALLOCATE(PARTITION(I)%SET)
-END DO
-DEALLOCATE(PARTITION)
-DEALLOCATE(PARTITION_SIZES)	
-RETURN
-END SUBROUTINE CLEANUP_PAR
-
-SUBROUTINE TEST_OPTIONS
-IMPLICIT NONE
-
-! Illustrate use of optional arguments NUMRR, NO_SCALING, USER_F_DF:
-
-TRACKTOL = 1.0E-6_R8;  FINALTOL = 1.0E-8_R8
-CALL POLSYS_PLP(N,TRACKTOL,FINALTOL,SINGTOL,SSPAR,BPLP,IFLAG1,IFLAG2, &
-  ARCLEN,LAMBDA,ROOTS,NFE,SCALE_FACTORS, NUMRR=1, NO_SCALING=.TRUE.,  &
-  USER_F_DF=.TRUE.)
-
-M = 13
-WRITE (7,FMT="(//'Testing optional arguments.')")
-WRITE (7,260) M,ARCLEN(M),NFE(M),IFLAG2(M)
-IF (MOD(IFLAG2(M),10) == 1) THEN
-  WRITE (7,310) 1.0_R8,LAMBDA(M)
-ELSE
-  WRITE (7,315) LAMBDA(M)
-END IF
-WRITE (7,320) (J,ROOTS(J,M),J=1,N)
-WRITE (7,330) N + 1, ROOTS(N+1,M)
-
-! Now retrack one of these paths (#13) using the RECALL option:
-
-IFLAG2(13) = -2
-TRACKTOL = 1.0E-10_R8;  FINALTOL = 1.0E-14_R8
-CALL POLSYS_PLP(N,TRACKTOL,FINALTOL,SINGTOL,SSPAR,BPLP,IFLAG1,IFLAG2, &
-  ARCLEN,LAMBDA,ROOTS,NFE,SCALE_FACTORS, NUMRR=3, NO_SCALING=.TRUE.,  &
-  USER_F_DF=.TRUE., RECALL=.TRUE.)
-
-M = 13
-WRITE (7,FMT="(//'Statistics for retracked path.')")
-WRITE (7,260) M,ARCLEN(M),NFE(M),IFLAG2(M)
-IF (MOD(IFLAG2(M),10) == 1) THEN
-  WRITE (7,310) 1.0_R8,LAMBDA(M)
-ELSE
-  WRITE (7,315) LAMBDA(M)
-END IF
-WRITE (7,320) (J,ROOTS(J,M),J=1,N)
-WRITE (7,330) N + 1, ROOTS(N+1,M)
-RETURN
-
-260 FORMAT(/'PATH NUMBER =',I10//'ARCLEN =',ES22.14/'NFE =',I5/ &
-    'IFLAG2 =',I3)
-310 FORMAT('LAMBDA =',ES22.14,', ESTIMATED ERROR =',ES22.14/)
-315 FORMAT('LAMBDA =',ES22.14/)
-320 FORMAT(('X(',I2,') = (',ES22.14,',',ES22.14,')'))
-330 FORMAT(/,'X(',I2,') = (',ES22.14,',',ES22.14,')')
-END SUBROUTINE TEST_OPTIONS
-
-END PROGRAM MAIN_TEMPLATE
-
-                                                                      !!!
-SUBROUTINE TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF)
-! Template for user written subroutine to evaluate the (complex) target
-! system F(XC) and its (complex) N x N Jacobian matrix DF(XC).  XC(1:N+1)
-! is in complex projective coordinates, and the homogeneous coordinate
-! XC(N+1) is explicitly eliminated from F(XC) and DF(XC) using the
-! projective transformation (cf. the comments in START_POINTS_PLP).  The
-! comments in the internal subroutine TARGET_SYSTEM should be read before
-! attempting to write this subroutine; pay particular attention to the
-! handling of the homogeneous coordinate XC(N+1).  DF(:,N+1) is not
-! referenced by the calling program.
-
-USE REAL_PRECISION
-USE GLOBAL_PLP
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-COMPLEX (KIND=R8), INTENT(IN), DIMENSION(N+1):: PROJ_COEF,XC
-COMPLEX (KIND=R8), INTENT(OUT):: F(N), DF(N,N+1)
-
-! For greater efficiency, replace the following code (which is just the
-! internal POLSYS_PLP subroutine TARGET_SYSTEM) with hand-crafted code.
-
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-INTEGER:: DEGREE, I, J, K, L
-COMPLEX (KIND=R8):: T, TS
-DO I=1,N
-  TS = (0.0_R8, 0.0_R8)
-  DO J=1,POLYNOMIAL(I)%NUM_TERMS
-    T = POLYNOMIAL(I)%TERM(J)%COEF
-    DO K=1,N+1
-      DEGREE = POLYNOMIAL(I)%TERM(J)%DEG(K)
-      IF (DEGREE == 0) CYCLE
-      T = T * XC(K)**DEGREE
-    END DO
-    TS = TS + T
-  END DO
-  F(I) = TS
-END DO 
-
-DF = (0.0_R8,0.0_R8)
-
-DO I=1,N
-  DO J=1,N+1
-    TS = (0.0_R8,0.0_R8)
-    DO K=1,POLYNOMIAL(I)%NUM_TERMS
-      DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(J)
-      IF (DEGREE == 0) CYCLE
-      T = POLYNOMIAL(I)%TERM(K)%COEF * DEGREE * (XC(J)**(DEGREE - 1))
-      DO L=1,N+1
-        DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(L)
-        IF ((L == J) .OR. (DEGREE == 0)) CYCLE
-        T = T * (XC(L)**DEGREE)
-      END DO
-      TS = TS + T
-    END DO
-    DF(I,J) = TS
-  END DO
-END DO
-
-DO I=1,N
-  DF(I,1:N) = DF(I,1:N) + PROJ_COEF(1:N) * DF(I,N+1)
-END DO
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-
-RETURN
-END SUBROUTINE TARGET_SYSTEM_USER
diff --git a/sandbox/801/Drivers/polsys.mod b/sandbox/801/Drivers/polsys.mod
deleted file mode 100644
index ee3fbb4..0000000
--- a/sandbox/801/Drivers/polsys.mod
+++ /dev/null
@@ -1,222 +0,0 @@
-GFORTRAN module version '0' created from ../Src/polsys_plp.f90 on Fri Dec 10 14:57:50 2010
-MD5:4a99fa792cf9752cf8b7506b3f61e498 -- If you edit this, you'll get what you deserve.
-
-(() () () ()
-() () () () () () () () () () () () () () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'bezout_plp' 'polsys' 'bezout_plp' 1 ((PROCEDURE UNKNOWN-INTENT
-MODULE-PROC DECL UNKNOWN SUBROUTINE) (UNKNOWN 0 0 0 UNKNOWN ()) 3 0 (4 5
-6 7) () 0 () () () 0 0)
-8 'c' 'global_plp' 'c' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 9 0 (10 11) () 8 () () () 0
-0)
-12 'd' 'global_plp' 'd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 13 0 (14 15 16) () 12 () ()
-() 0 0)
-17 'global_plp' 'global_plp' 'global_plp' 1 ((MODULE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 ()
-() () 0 0)
-18 'large' 'global_plp' 'large' 1 ((PARAMETER UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-19 'numt' 'global_plp' 'numt' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 20 0 (21) () 19 () ()
-() 0 0)
-22 'numv' 'global_plp' 'numv' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 23 0 (24 25) () 22 ()
-() () 0 0)
-26 'par' 'global_plp' 'par' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 27 0 (28 29 30) () 26
-() () () 0 0)
-31 'partition' 'global_plp' 'partition' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 32 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-33 'partition_sizes' 'global_plp' 'partition_sizes' 1 ((VARIABLE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-32 'partition_type' 'global_plp' 'partition_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((34 'set' (DERIVED 35 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-36 'pi' 'global_plp' 'pi' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (REAL 8 0 0 REAL ()) 0 0 () (CONSTANT (REAL 8 0 0
-REAL ()) 0 '0.3243f6a8885a30@1') () 0 () () () 0 0)
-37 'polsys' 'polsys' 'polsys' 1 ((MODULE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 () () () 0 0)
-38 'polsys_plp' 'polsys' 'polsys_plp' 1 ((PROCEDURE UNKNOWN-INTENT
-MODULE-PROC DECL UNKNOWN SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0
-UNKNOWN ()) 39 0 (40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56) ()
-0 () () () 0 0)
-57 'polynomial' 'global_plp' 'polynomial' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 58 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-58 'polynomial_type' 'global_plp' 'polynomial_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((59 'term' (DERIVED 60 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ()) (61 'num_terms' (INTEGER 4 0 0
-INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN)
-UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-62 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-63 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-64 'sc' 'global_plp' 'sc' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 65 0 (66 67 68) () 64 () ()
-() 0 0)
-69 'sd' 'global_plp' 'sd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 70 0 (71 72) () 69 () () ()
-0 0)
-73 'selected_int_kind' '(intrinsic)' 'selected_int_kind' 1 ((PROCEDURE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4 0 0 REAL ())
-0 0 () () 73 () () () 0 0)
-35 'set_type' 'global_plp' 'set_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((74 'index' (INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER)
-UNKNOWN-ACCESS ()) (75 'num_indices' (INTEGER 4 0 0 INTEGER ()) () (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ())
-(76 'set_deg' (INTEGER 4 0 0 INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (77 'start_coef' (
-COMPLEX 8 0 0 COMPLEX ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-78 'singsys_plp' 'polsys' 'singsys_plp' 1 ((PROCEDURE UNKNOWN-INTENT
-MODULE-PROC DECL UNKNOWN SUBROUTINE) (UNKNOWN 0 0 0 UNKNOWN ()) 79 0 (
-80 81 82 83 84 85 86) () 0 () () () 0 0)
-60 'term_type' 'global_plp' 'term_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((87 'coef' (COMPLEX 8 0 0 COMPLEX ()) () (UNKNOWN-FL
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (88 'deg'
-(INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-42 'finaltol' '' 'finaltol' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-43 'singtol' '' 'singtol' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN
-UNKNOWN DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-41 'tracktol' '' 'tracktol' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-47 'iflag2' '' 'iflag2' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION POINTER DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0
-() (1 DEFERRED () ()) 0 () () () 0 0)
-48 'arclen' '' 'arclen' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION POINTER DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-49 'lambda' '' 'lambda' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION POINTER DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-50 'roots' '' 'roots' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION POINTER DUMMY) (COMPLEX 8 0 0 COMPLEX ()) 0 0 () (2
-DEFERRED () () () ()) 0 () () () 0 0)
-51 'nfe' '' 'nfe' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION POINTER DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-52 'scale_factors' '' 'scale_factors' 39 ((VARIABLE INOUT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1
-ASSUMED_SHAPE (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') ()) 0 () () ()
-0 0)
-40 'n' '' 'n' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-53 'numrr' '' 'numrr' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-OPTIONAL DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-54 'recall' '' 'recall' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-OPTIONAL DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () () 0 0)
-55 'no_scaling' '' 'no_scaling' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN OPTIONAL DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () ()
-0 0)
-56 'user_f_df' '' 'user_f_df' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN OPTIONAL DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () ()
-0 0)
-11 'j' '' 'j' 9 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-10 'i' '' 'i' 9 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-21 'i' '' 'i' 20 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-25 'j' '' 'j' 23 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-24 'i' '' 'i' 23 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-30 'k' '' 'k' 27 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-29 'j' '' 'j' 27 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-44 'sspar' '' 'sspar' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 EXPLICIT (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '1') (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0
-'8')) 0 () () () 0 0)
-45 'bplp' '' 'bplp' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-46 'iflag1' '' 'iflag1' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-71 'i' '' 'i' 70 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-72 'j' '' 'j' 70 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-28 'i' '' 'i' 27 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-14 'i' '' 'i' 13 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-16 'k' '' 'k' 13 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-15 'j' '' 'j' 13 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-66 'i' '' 'i' 65 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-68 'k' '' 'k' 65 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-67 'j' '' 'j' 65 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-4 'n' '' 'n' 3 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-5 'maxt' '' 'maxt' 3 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-6 'tol' '' 'tol' 3 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY)
-(REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-7 'bplp' '' 'bplp' 3 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY)
-(INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-80 'n' '' 'n' 79 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-81 'lex_num' '' 'lex_num' 79 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () (1 EXPLICIT (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (VARIABLE (INTEGER 4 0 0
-INTEGER ()) 0 80 ())) 0 () () () 0 0)
-82 'lex_save' '' 'lex_save' 79 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () (1 EXPLICIT (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (VARIABLE (INTEGER 4 0 0
-INTEGER ()) 0 80 ())) 0 () () () 0 0)
-83 'tol' '' 'tol' 79 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-84 'rand_mat' '' 'rand_mat' 79 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (2 EXPLICIT (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (VARIABLE (INTEGER 4 0 0
-INTEGER ()) 0 80 ()) (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (
-VARIABLE (INTEGER 4 0 0 INTEGER ()) 0 80 ())) 0 () () () 0 0)
-85 'mat' '' 'mat' 79 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (2 EXPLICIT (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '1') (OP (INTEGER 4 0 0 INTEGER ()) 0 PLUS (
-VARIABLE (INTEGER 4 0 0 INTEGER ()) 0 80 ()) (CONSTANT (INTEGER 4 0 0
-INTEGER ()) 0 '1')) (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (
-VARIABLE (INTEGER 4 0 0 INTEGER ()) 0 80 ())) 0 () () () 0 0)
-86 'nonsing' '' 'nonsing' 79 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () () 0 0)
-)
-
-('bezout_plp' 0 2 'c' 0 8 'd' 0 12 'global_plp' 0 17 'large' 0 18 'numt'
-0 19 'numv' 0 22 'par' 0 26 'partition' 0 31 'partition_sizes' 0 33
-'partition_type' 0 32 'pi' 0 36 'polsys' 0 37 'polsys_plp' 0 38
-'polynomial' 0 57 'polynomial_type' 0 58 'r8' 0 62 'real_precision' 0 63
-'sc' 0 64 'sd' 0 69 'selected_int_kind' 0 73 'set_type' 0 35 'singsys_plp'
-0 78 'term_type' 0 60)
diff --git a/sandbox/801/Drivers/real_precision.mod b/sandbox/801/Drivers/real_precision.mod
deleted file mode 100644
index a2b2a70..0000000
--- a/sandbox/801/Drivers/real_precision.mod
+++ /dev/null
@@ -1,26 +0,0 @@
-GFORTRAN module version '0' created from ../Src/polsys_plp.f90 on Fri Dec 10 14:57:50 2010
-MD5:091ad80a20a08fac65d225d1cb0c232e -- If you edit this, you'll get what you deserve.
-
-(() () () () () () () () () () () () () () () () () () () () () () () ()
-() () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-3 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-4 'selected_real_kind' '(intrinsic)' 'selected_real_kind' 1 ((PROCEDURE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4 0 0 REAL ())
-0 0 () () 4 () () () 0 0)
-)
-
-('r8' 0 2 'real_precision' 0 3 'selected_real_kind' 0 4)
diff --git a/sandbox/801/Drivers/test_install b/sandbox/801/Drivers/test_install
deleted file mode 100755
index 6e18afb..0000000
Binary files a/sandbox/801/Drivers/test_install and /dev/null differ
diff --git a/sandbox/801/Drivers/test_install.f90 b/sandbox/801/Drivers/test_install.f90
deleted file mode 100644
index ca7849d..0000000
--- a/sandbox/801/Drivers/test_install.f90
+++ /dev/null
@@ -1,205 +0,0 @@
-! This file contains a main program to test the correctness of the
-! compiled code; it is uncommented and has no further use beyond testing
-! the installation.  Author: Layne T. Watson, 10/1999.
-
-! Compile this file (free form Fortran 90) and link it to the object
-! files from the compiles of polsys_plp.f90 (free form) and lapack_plp.f
-! (fixed format).  Then run the executable with input file INPUT.DAT
-! (upper case).  A message indicating apparent success or failure of the
-! installation is written to standard out.
-
-PROGRAM TEST_INSTALL
-
-USE POLSYS
-
-IMPLICIT NONE
-INTEGER, PARAMETER:: NN=30, MMAXT=50
-INTEGER:: BPLP, I, IFLAG1, J, K, M, MAXT, N, NUMRR=1
-INTEGER, DIMENSION(NN):: NUM_TERMS, NUM_SETS
-INTEGER, DIMENSION(NN,NN):: NUM_INDICES
-INTEGER, DIMENSION(NN,NN,NN):: INDEX
-INTEGER, DIMENSION(NN,MMAXT,NN):: DEG
-INTEGER, DIMENSION(:), POINTER:: IFLAG2, NFE
-REAL (KIND=R8):: TRACKTOL, FINALTOL, SINGTOL
-REAL (KIND=R8), DIMENSION(8):: SSPAR
-REAL (KIND=R8), DIMENSION(NN):: SCALE_FACTORS
-REAL (KIND=R8), DIMENSION(:), POINTER:: ARCLEN, LAMBDA
-COMPLEX (KIND=R8), DIMENSION(NN,MMAXT):: COEF
-COMPLEX (KIND=R8), DIMENSION(:,:), POINTER:: ROOTS
-COMPLEX (KIND=R8), DIMENSION(2,4):: EROOTS = RESHAPE(SOURCE=(/  &
-  (  2.34233851959121E+03_R8,  0.0E00_R8),   &
-  ( -7.88344824094120E-01_R8,  0.0E00_R8),   &
-  (  9.08921229615388E-02_R8,  0.0E00_R8),   &
-  ( -9.11497098197499E-02_R8,  0.0E00_R8),   &
-  (  1.61478579234357E-02_R8,  1.68496955498881E+00_R8),     &
-  (  2.67994739614461E-04_R8,  4.42802993973661E-03_R8),     &
-  (  1.61478579234359E-02_R8, -1.68496955498881E+00_R8),     &
-  (  2.67994739614461E-04_R8, -4.42802993973661E-03_R8)  /), &
-  SHAPE=(/ 2,4 /) )
-CHARACTER (LEN=80):: TITLE
-CHARACTER (LEN=80), DIMENSION(NN):: P
-LOGICAL:: NEW_PROBLEM, ROOT_COUNT_ONLY
-
-NAMELIST /PROBLEM/ COEF, DEG, FINALTOL, NEW_PROBLEM, N, NUMRR, NUM_TERMS,  &
-  SINGTOL, SSPAR, TITLE, TRACKTOL
-NAMELIST /SYSPARTITION/ INDEX, NUM_INDICES, NUM_SETS, P, ROOT_COUNT_ONLY
-
-NULLIFY(IFLAG2, NFE, ARCLEN, LAMBDA, ROOTS) ! Disassociate pointers.
-
-OPEN (UNIT=3,FILE='INPUT.DAT',ACTION='READ',POSITION='REWIND',   &
-     DELIM='APOSTROPHE',STATUS='OLD')
-
-SSPAR(1:8) = 0.0_R8 ; DEG = 0 ; COEF = (0.0_R8,0.0_R8)
-
-READ (3,NML=PROBLEM)
-
-CALL CLEANUP_POL
-ALLOCATE(POLYNOMIAL(N))
-DO I=1,N
-  POLYNOMIAL(I)%NUM_TERMS=NUM_TERMS(I)
-  ALLOCATE(POLYNOMIAL(I)%TERM(NUM_TERMS(I)))
-  DO J=1,NUM_TERMS(I)
-    ALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG(N+1))
-    POLYNOMIAL(I)%TERM(J)%COEF=COEF(I,J) 
-    POLYNOMIAL(I)%TERM(J)%DEG(1:N)=DEG(I,J,1:N)
-  END DO
-END DO
-
-READ (3,NML=SYSPARTITION)
-
-CALL CLEANUP_PAR
-ALLOCATE(PARTITION_SIZES(N))
-PARTITION_SIZES(1:N)=NUM_SETS(1:N)
-ALLOCATE(PARTITION(N))
-DO I=1,N
-  ALLOCATE(PARTITION(I)%SET(PARTITION_SIZES(I)))
-  DO J=1,PARTITION_SIZES(I)
-    PARTITION(I)%SET(J)%NUM_INDICES=NUM_INDICES(I,J)
-    ALLOCATE(PARTITION(I)%SET(J)%INDEX(NUM_INDICES(I,J)))
-    PARTITION(I)%SET(J)%INDEX(1:NUM_INDICES(I,J)) = &
-      INDEX(I,J,1:NUM_INDICES(I,J))
-  END DO 
-END DO
-
-CALL POLSYS_PLP(N,TRACKTOL,FINALTOL,SINGTOL,SSPAR,BPLP,IFLAG1,IFLAG2, &
-    ARCLEN,LAMBDA,ROOTS,NFE,SCALE_FACTORS)
-
-SINGTOL = 0.0_R8
-DO I=1,BPLP
-  SINGTOL = MAX(SINGTOL, MINVAL(SUM(ABS(SPREAD(   &
-    EROOTS(1:2,I),DIM=2,NCOPIES=BPLP) - ROOTS(1:2,1:BPLP)), DIM=1)))
-END DO
-
-IF (SINGTOL < 1.0E-6_R8) THEN
-  WRITE (*,*) 'Test problem was solved correctly. The installation ', &
-    'appears correct.'
-ELSE
-  WRITE (*,*) 'Warning!  Test problem was not solved correctly.'
-END IF
-
-CLOSE (UNIT=3)
-CALL CLEANUP_POL
-CALL CLEANUP_PAR
-STOP
-
-CONTAINS
-
-SUBROUTINE CLEANUP_POL
-
-! Deallocates structure POLYNOMIAL.
-
-IF (.NOT. ALLOCATED(POLYNOMIAL)) RETURN
-DO I=1,SIZE(POLYNOMIAL)
-  DO J=1,NUMT(I)
-    DEALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG)
-  END DO
-  DEALLOCATE(POLYNOMIAL(I)%TERM)
-END DO
-DEALLOCATE(POLYNOMIAL)
-RETURN
-END SUBROUTINE CLEANUP_POL
-
-SUBROUTINE CLEANUP_PAR
-
-! Deallocates structure PARTITION.
-
-IF (.NOT. ALLOCATED(PARTITION)) RETURN
-DO I=1,SIZE(PARTITION)
-  DO J=1,PARTITION_SIZES(I)
-    DEALLOCATE(PARTITION(I)%SET(J)%INDEX)
-  END DO
-  DEALLOCATE(PARTITION(I)%SET)
-END DO
-DEALLOCATE(PARTITION)
-DEALLOCATE(PARTITION_SIZES)	
-RETURN
-END SUBROUTINE CLEANUP_PAR
-
-END PROGRAM TEST_INSTALL
-
-                                                                      !!!
-SUBROUTINE TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF)
-! Template for user written subroutine to evaluate the (complex) target
-! system F(XC) and its (complex) N x N Jacobian matrix DF(XC).  XC(1:N+1)
-! is in complex projective coordinates, and the homogeneous coordinate
-! XC(N+1) is explicitly eliminated from F(XC) and DF(XC) using the
-! projective transformation (cf. the comments in START_POINTS_PLP).  The
-! comments in the internal subroutine TARGET_SYSTEM should be read before
-! attempting to write this subroutine; pay particular attention to the
-! handling of the homogeneous coordinate XC(N+1).  DF(:,N+1) is not
-! referenced by the calling program.
-
-USE REAL_PRECISION
-USE GLOBAL_PLP
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-COMPLEX (KIND=R8), INTENT(IN), DIMENSION(N+1):: PROJ_COEF,XC
-COMPLEX (KIND=R8), INTENT(OUT):: F(N), DF(N,N+1)
-
-! For greater efficiency, replace the following code (which is just the
-! internal POLSYS_PLP subroutine TARGET_SYSTEM) with hand-crafted code.
-
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-INTEGER:: DEGREE, I, J, K, L
-COMPLEX (KIND=R8):: T, TS
-DO I=1,N
-  TS = (0.0_R8, 0.0_R8)
-  DO J=1,POLYNOMIAL(I)%NUM_TERMS
-    T = POLYNOMIAL(I)%TERM(J)%COEF
-    DO K=1,N+1
-      DEGREE = POLYNOMIAL(I)%TERM(J)%DEG(K)
-      IF (DEGREE == 0) CYCLE
-      T = T * XC(K)**DEGREE
-    END DO
-    TS = TS + T
-  END DO
-  F(I)=TS
-END DO 
-
-DF=(0.0_R8,0.0_R8)
-
-DO I=1,N
-  DO J=1,N+1
-    TS = (0.0_R8,0.0_R8)
-    DO K=1,POLYNOMIAL(I)%NUM_TERMS
-      DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(J)
-      IF (DEGREE == 0) CYCLE
-      T = POLYNOMIAL(I)%TERM(K)%COEF * DEGREE * (XC(J)**(DEGREE - 1))
-      DO L=1,N+1
-        DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(L)
-        IF ((L == J) .OR. (DEGREE == 0)) CYCLE
-        T = T * (XC(L)**DEGREE)
-      END DO
-      TS = TS + T
-    END DO
-    DF(I,J) = TS
-  END DO
-END DO
-
-DO I=1,N
-  DF(I,1:N) = DF(I,1:N) + PROJ_COEF(1:N) * DF(I,N+1)
-END DO
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-
-RETURN
-END SUBROUTINE TARGET_SYSTEM_USER
diff --git a/sandbox/801/INPUT.DAT.hurwitz b/sandbox/801/INPUT.DAT.hurwitz
deleted file mode 100644
index 2c4421f..0000000
--- a/sandbox/801/INPUT.DAT.hurwitz
+++ /dev/null
@@ -1,74 +0,0 @@
-&PROBLEM  NEW_PROBLEM=.TRUE.
-TITLE='0 => 0, 1 => 1, inf => inf, c => 1+i.'
-
-TRACKTOL = 1.0D-4  FINALTOL = 1.0D-14  SINGTOL = 0.0  SSPAR(5) = 1.0D0
-NUMRR = 1
-N = 9
-
-NUM_TERMS(1) = 1
-COEF(1,1) = 1.0   DEG(1,1,1) = 1
-
-NUM_TERMS(2) = 8
-COEF(2,1) = -1.0  DEG(2,1,1) = 1
-COEF(2,2) = -1.0  DEG(2,2,2) = 1
-COEF(2,3) = -1.0  DEG(2,3,3) = 1
-COEF(2,4) = -1.0  DEG(2,4,4) = 1
-COEF(2,5) = 1.0   DEG(2,5,5) = 1
-COEF(2,6) = 1.0   DEG(2,6,6) = 1
-COEF(2,7) = 1.0   DEG(2,7,7) = 1
-COEF(2,8) = 1.0   DEG(2,8,8) = 1
-
-NUM_TERMS(3) = 1
-COEF(3,1) = 1.0   DEG(3,1,4) = 1
-
-NUM_TERMS(4) = 8
-COEF(4,1) = -1.0  DEG(4,1,1) = 1 DEG(4,1,9) = 0
-COEF(4,2) = -1.0  DEG(4,2,2) = 1 DEG(4,2,9) = 1
-COEF(4,3) = -1.0  DEG(4,3,3) = 1 DEG(4,3,9) = 2
-COEF(4,4) = -1.0  DEG(4,4,4) = 1 DEG(4,4,9) = 3
-COEF(4,5) = (1.0,1.0)  DEG(4,5,5) = 1 DEG(4,5,9) = 0
-COEF(4,6) = (1.0,1.0)  DEG(4,6,6) = 1 DEG(4,6,9) = 1
-COEF(4,7) = (1.0,1.0)  DEG(4,7,7) = 1 DEG(4,7,9) = 2
-COEF(4,8) = (1.0,1.0)  DEG(4,8,8) = 1 DEG(4,8,9) = 3
-
-NUM_TERMS(5) = 3
-COEFF(5,1) = 1.0  DEG(5,1,2) = 1 DEG(5,1,5) = 1
-COEFF(5,2) = -1.0 DEG(5,2,1) = 1 DEG(5,2,6) = 1
-COEFF(5,3) = 0.0
-
-NUM_TERMS(6) = 4
-COEFF(6,1) = 2.0  DEG(6,1,3) = 1 DEG(6,1,5) = 1
-COEFF(6,2) = 0.0  DEG(6,2,2) = 1 DEG(6,2,6) = 1
-COEFF(6,3) = -2.0 DEG(6,3,1) = 1 DEG(6,3,7) = 1
-COEFF(6,4) = -1.0                               DEG(6,4,9) = 1
-
-NUM_TERMS(7) = 6
-COEFF(7,1) = 3.0  DEG(7,1,4) = 1 DEG(7,1,5) = 1
-COEFF(7,2) = 1.0  DEG(7,2,3) = 1 DEG(7,2,6) = 1
-COEFF(7,3) = -1.0 DEG(7,3,2) = 1 DEG(7,3,7) = 1
-COEFF(7,4) = -3.0 DEG(7,4,1) = 1 DEG(7,4,8) = 1
-COEFF(7,5) = 1.0
-COEFF(7,6) = 1.0                                DEG(7,6,9) = 1
-
-NUM_TERMS(8) = 4
-COEFF(8,1) = 2.0  DEG(8,1,4) = 1 DEG(8,1,6) = 1
-COEFF(8,2) = 0.0  DEG(8,2,3) = 1 DEG(8,2,7) = 1
-COEFF(8,3) = -2.0 DEG(8,3,2) = 1 DEG(8,3,8) = 1
-COEFF(8,4) = -1.0
-
-NUM_TERMS(9) = 3
-COEFF(9,1) = 1.0  DEG(9,1,4) = 1 DEG(9,1,7) = 1
-COEFF(9,2) = -1.0 DEG(9,2,3) = 1 DEG(9,2,8) = 1
-COEFF(9,3) = 0.0
-
-&SYSPARTITION  ROOT_COUNT_ONLY = .TRUE.
-
-NUM_SETS(1) = 1
-NUM_INDICES(1,1) = 2
-INDEX(1,1,1) = 1
-INDEX(1,1,2) = 2
-
-NUM_SETS(2) = 1
-NUM_INDICES(2,1) = 2
-INDEX(2,1,1) = 1
-INDEX(2,1,2) = 2   /
diff --git a/sandbox/801/INPUT.DAT.hurwitz2 b/sandbox/801/INPUT.DAT.hurwitz2
deleted file mode 100644
index 54928c0..0000000
--- a/sandbox/801/INPUT.DAT.hurwitz2
+++ /dev/null
@@ -1,183 +0,0 @@
-&PROBLEM  NEW_PROBLEM=.TRUE.
-TITLE='0 => 0, 1 => 1, inf => inf, c => 1+i.'
-
-TRACKTOL = 1.0D-4  FINALTOL = 1.0D-14  SINGTOL = 0.0  SSPAR(5) = 1.0D0
-NUMRR = 1
-N = 9
-
-NUM_TERMS(1) = 1
-COEF(1,1) = (1.0,0.0)   DEG(1,1,1) = 1
-
-NUM_TERMS(2) = 8
-COEF(2,1) = (-1.0,0.0)  DEG(2,1,1) = 1
-COEF(2,2) = (-1.0,0.0)  DEG(2,2,2) = 1
-COEF(2,3) = (-1.0,0.0)  DEG(2,3,3) = 1
-COEF(2,4) = (-1.0,0.0)  DEG(2,4,4) = 1
-COEF(2,5) = (1.0,0.0)   DEG(2,5,5) = 1
-COEF(2,6) = (1.0,0.0)   DEG(2,6,6) = 1
-COEF(2,7) = (1.0,0.0)   DEG(2,7,7) = 1
-COEF(2,8) = (1.0,0.0)   DEG(2,8,8) = 1
-
-NUM_TERMS(3) = 1
-COEF(3,1) = (1.0,0.0)   DEG(3,1,8) = 1
-
-NUM_TERMS(4) = 8
-COEF(4,1) = (-1.0,0.0)  DEG(4,1,1) = 1 DEG(4,1,9) = 0
-COEF(4,2) = (-1.0,0.0)  DEG(4,2,2) = 1 DEG(4,2,9) = 1
-COEF(4,3) = (-1.0,0.0)  DEG(4,3,3) = 1 DEG(4,3,9) = 2
-COEF(4,4) = (-1.0,0.0)  DEG(4,4,4) = 1 DEG(4,4,9) = 3
-COEF(4,5) = (1.0,1.0)  DEG(4,5,5) = 1 DEG(4,5,9) = 0
-COEF(4,6) = (1.0,1.0)  DEG(4,6,6) = 1 DEG(4,6,9) = 1
-COEF(4,7) = (1.0,1.0)  DEG(4,7,7) = 1 DEG(4,7,9) = 2
-COEF(4,8) = (1.0,1.0)  DEG(4,8,8) = 1 DEG(4,8,9) = 3
-
-NUM_TERMS(5) = 3
-COEF(5,1) = (1.0,0.0)  DEG(5,1,2) = 1 DEG(5,1,5) = 1
-COEF(5,2) = (-1.0,0.0) DEG(5,2,1) = 1 DEG(5,2,6) = 1
-COEF(5,3) = (0.0,0.0)
-
-NUM_TERMS(6) = 4
-COEF(6,1) = (2.0,0.0)  DEG(6,1,3) = 1 DEG(6,1,5) = 1
-COEF(6,2) = (0.0,0.0)  DEG(6,2,2) = 1 DEG(6,2,6) = 1
-COEF(6,3) = (-2.0,0.0) DEG(6,3,1) = 1 DEG(6,3,7) = 1
-COEF(6,4) = (-1.0,0.0)                               DEG(6,4,9) = 1
-
-NUM_TERMS(7) = 6
-COEF(7,1) = (3.0,0.0)  DEG(7,1,4) = 1 DEG(7,1,5) = 1
-COEF(7,2) = (1.0,0.0)  DEG(7,2,3) = 1 DEG(7,2,6) = 1
-COEF(7,3) = (-1.0,0.0) DEG(7,3,2) = 1 DEG(7,3,7) = 1
-COEF(7,4) = (-3.0,0.0) DEG(7,4,1) = 1 DEG(7,4,8) = 1
-COEF(7,5) = (1.0,0.0)
-COEF(7,6) = (1.0,0.0)                                DEG(7,6,9) = 1
-
-NUM_TERMS(8) = 4
-COEF(8,1) = (2.0,0.0)  DEG(8,1,4) = 1 DEG(8,1,6) = 1
-COEF(8,2) = (0.0,0.0)  DEG(8,2,3) = 1 DEG(8,2,7) = 1
-COEF(8,3) = (-2.0,0.0) DEG(8,3,2) = 1 DEG(8,3,8) = 1
-COEF(8,4) = (-1.0,0.0)
-
-NUM_TERMS(9) = 3
-COEF(9,1) = (1.0,0.0)  DEG(9,1,4) = 1 DEG(9,1,7) = 1
-COEF(9,2) = (-1.0,0.0) DEG(9,2,3) = 1 DEG(9,2,8) = 1
-COEF(9,3) = (0.0,0.0)
-/
-
-&SYSPARTITION  ROOT_COUNT_ONLY = .FALSE.
-P(1) = 'all'
-P(2) = 'all'
-P(3) = 'all'
-P(4) = 'all'
-P(5) = 'all'
-P(6) = 'all'
-P(7) = 'all'
-P(8) = 'all'
-P(9) = 'all'
-
-NUM_SETS(1) = 1
-NUM_INDICES(1,1) = 9
-INDEX(1,1,1) = 1
-INDEX(1,1,2) = 2
-INDEX(1,1,3) = 3
-INDEX(1,1,4) = 4
-INDEX(1,1,5) = 5
-INDEX(1,1,6) = 6
-INDEX(1,1,7) = 7
-INDEX(1,1,8) = 8
-INDEX(1,1,9) = 9
-
-NUM_SETS(2) = 1
-NUM_INDICES(2,1) = 9
-INDEX(2,1,1) = 1
-INDEX(2,1,2) = 2
-INDEX(2,1,3) = 3
-INDEX(2,1,4) = 4
-INDEX(2,1,5) = 5
-INDEX(2,1,6) = 6
-INDEX(2,1,7) = 7
-INDEX(2,1,8) = 8
-INDEX(2,1,9) = 9
-
-NUM_SETS(3) = 1
-NUM_INDICES(3,1) = 9
-INDEX(3,1,1) = 1
-INDEX(3,1,2) = 2
-INDEX(3,1,3) = 3
-INDEX(3,1,4) = 4
-INDEX(3,1,5) = 5
-INDEX(3,1,6) = 6
-INDEX(3,1,7) = 7
-INDEX(3,1,8) = 8
-INDEX(3,1,9) = 9
-
-NUM_SETS(4) = 1
-NUM_INDICES(4,1) = 9
-INDEX(4,1,1) = 1
-INDEX(4,1,2) = 2
-INDEX(4,1,3) = 3
-INDEX(4,1,4) = 4
-INDEX(4,1,5) = 5
-INDEX(4,1,6) = 6
-INDEX(4,1,7) = 7
-INDEX(4,1,8) = 8
-INDEX(4,1,9) = 9
-
-NUM_SETS(5) = 1
-NUM_INDICES(5,1) = 9
-INDEX(5,1,1) = 1
-INDEX(5,1,2) = 2
-INDEX(5,1,3) = 3
-INDEX(5,1,4) = 4
-INDEX(5,1,5) = 5
-INDEX(5,1,6) = 6
-INDEX(5,1,7) = 7
-INDEX(5,1,8) = 8
-INDEX(5,1,9) = 9
-
-NUM_SETS(6) = 1
-NUM_INDICES(6,1) = 9
-INDEX(6,1,1) = 1
-INDEX(6,1,2) = 2
-INDEX(6,1,3) = 3
-INDEX(6,1,4) = 4
-INDEX(6,1,5) = 5
-INDEX(6,1,6) = 6
-INDEX(6,1,7) = 7
-INDEX(6,1,8) = 8
-INDEX(6,1,9) = 9
-
-NUM_SETS(7) = 1
-NUM_INDICES(7,1) = 9
-INDEX(7,1,1) = 1
-INDEX(7,1,2) = 2
-INDEX(7,1,3) = 3
-INDEX(7,1,4) = 4
-INDEX(7,1,5) = 5
-INDEX(7,1,6) = 6
-INDEX(7,1,7) = 7
-INDEX(7,1,8) = 8
-INDEX(7,1,9) = 9
-
-NUM_SETS(8) = 1
-NUM_INDICES(8,1) = 9
-INDEX(8,1,1) = 1
-INDEX(8,1,2) = 2
-INDEX(8,1,3) = 3
-INDEX(8,1,4) = 4
-INDEX(8,1,5) = 5
-INDEX(8,1,6) = 6
-INDEX(8,1,7) = 7
-INDEX(8,1,8) = 8
-INDEX(8,1,9) = 9
-
-NUM_SETS(9) = 1
-NUM_INDICES(9,1) = 9
-INDEX(9,1,1) = 1
-INDEX(9,1,2) = 2
-INDEX(9,1,3) = 3
-INDEX(9,1,4) = 4
-INDEX(9,1,5) = 5
-INDEX(9,1,6) = 6
-INDEX(9,1,7) = 7
-INDEX(9,1,8) = 8
-INDEX(9,1,9) = 9
-/
diff --git a/sandbox/801/OUTPUT.DAT b/sandbox/801/OUTPUT.DAT
deleted file mode 100644
index 97e5937..0000000
--- a/sandbox/801/OUTPUT.DAT
+++ /dev/null
@@ -1,89696 +0,0 @@
-
-
-
-Cui map                                                                         
-
-TRACKTOL, FINALTOL =  1.00000000000000E-05  1.00000000000000E-14
-SINGTOL (0 SETS DEFAULT) =  0.00000000000000E+00
-SSPAR(5) (0 SETS DEFAULT) =  1.00000000000000E+00
-NUMBER OF EQUATIONS =  4
-
-****** COEFFICIENT TABLEAU ******
-
-POLYNOMIAL( 1)%NUM_TERMS =107
-POLYNOMIAL( 1)%TERM( 1)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 1)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 2)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 2)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM( 2)%COEF = (  4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 3)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 3)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 4)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 4)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 4)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 5)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 5)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 6)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 7)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 7)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 8)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM( 8)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM( 9)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM( 9)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(10)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(10)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(11)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(11)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(12)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(12)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(12)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(12)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(13)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(13)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(13)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(14)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(14)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(14)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(15)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(15)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(15)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(16)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(16)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(16)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(17)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(17)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(17)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(17)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(17)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(18)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(18)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(18)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(18)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(18)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(19)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(19)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(19)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(19)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(19)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(20)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(20)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(20)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(20)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(20)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(21)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(21)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(21)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(21)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(21)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(22)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(22)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(22)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(22)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(22)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(23)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(23)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(23)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(23)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(23)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(24)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(24)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(24)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(24)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(24)%COEF = ( -1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(25)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(25)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(25)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(25)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(25)%COEF = (  1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(26)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(26)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(26)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(26)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(26)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(27)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(27)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(27)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(27)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(27)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(28)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(28)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(28)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(28)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(28)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(29)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(29)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(29)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(29)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(29)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(30)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(30)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(30)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(30)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(30)%COEF = ( -1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(31)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(31)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(31)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(31)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(31)%COEF = (  1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(32)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(32)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(32)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(32)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(32)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(33)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(33)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(33)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(33)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(33)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(34)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(34)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(34)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(34)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(34)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(35)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(35)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(35)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(35)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(35)%COEF = (  2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(36)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(36)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(36)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(36)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(36)%COEF = ( -2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(37)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(37)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(37)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(37)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(37)%COEF = (  8.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(38)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(38)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(38)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(38)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(38)%COEF = ( -1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(39)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(39)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(39)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(39)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(39)%COEF = (  1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(40)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(40)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(40)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(40)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(40)%COEF = (  4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(41)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(41)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(41)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(41)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(41)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(42)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(42)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(42)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(42)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(42)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(43)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(43)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(43)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(43)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(43)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(44)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(44)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(44)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(44)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(44)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(45)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(45)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(45)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(45)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(45)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(46)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(46)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(46)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(46)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(46)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(47)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(47)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(47)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(47)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(47)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(48)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(48)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(48)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(48)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(48)%COEF = (  4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(49)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(49)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(49)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(49)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(49)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(50)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(50)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(50)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(50)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(50)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(51)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(51)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(51)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(51)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(51)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(52)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(52)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(52)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(52)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(52)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(53)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(53)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(53)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(53)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(53)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(54)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(54)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(54)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(54)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(54)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(55)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(55)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(55)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(55)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(55)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(56)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(56)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(56)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(56)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(56)%COEF = (  4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(57)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(57)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(57)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(57)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(57)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(58)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(58)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(58)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(58)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(58)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(59)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(59)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(59)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(59)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(59)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(60)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(60)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(60)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(60)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(60)%COEF = (  4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(61)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(61)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(61)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(61)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(61)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(62)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(62)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(62)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(62)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(62)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(63)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(63)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(63)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(63)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(63)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(64)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(64)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(64)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(64)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(64)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(65)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(65)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(65)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(65)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(65)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(66)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(66)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(66)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(66)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(66)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(67)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(67)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(67)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(67)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(67)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(68)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(68)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(68)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(68)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(68)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(69)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(69)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(69)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(69)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(69)%COEF = ( -1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(70)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(70)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(70)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(70)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(70)%COEF = (  1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(71)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(71)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(71)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(71)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(71)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(72)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(72)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(72)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(72)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(72)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(73)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(73)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(73)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(73)%DEG( 4) = 0
-POLYNOMIAL( 1)%TERM(73)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(74)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(74)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(74)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(74)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(74)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(75)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(75)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(75)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(75)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(75)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(76)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(76)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(76)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(76)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(76)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(77)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(77)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(77)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(77)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(77)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(78)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(78)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(78)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(78)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(78)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(79)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(79)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(79)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(79)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(79)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(80)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(80)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(80)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(80)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(80)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(81)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(81)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(81)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(81)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(81)%COEF = ( -3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(82)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(82)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(82)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(82)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(82)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(83)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(83)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(83)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(83)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(83)%COEF = (  3.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(84)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(84)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(84)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(84)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(84)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(85)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(85)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(85)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(85)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(85)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(86)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(86)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(86)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(86)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(86)%COEF = (  4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(87)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(87)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(87)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(87)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(87)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(88)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(88)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(88)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(88)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(88)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(89)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(89)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(89)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(89)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(89)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(90)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(90)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(90)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(90)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(90)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(91)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(91)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(91)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(91)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(91)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(92)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(92)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(92)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(92)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(92)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(93)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(93)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(93)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(93)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(93)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(94)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(94)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(94)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(94)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(94)%COEF = (  1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(95)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(95)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(95)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(95)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(95)%COEF = ( -1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(96)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(96)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(96)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(96)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(96)%COEF = ( -1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(97)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(97)%DEG( 2) = 1
-POLYNOMIAL( 1)%TERM(97)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(97)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(97)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(98)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(98)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(98)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(98)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(98)%COEF = (  1.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(99)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(99)%DEG( 2) = 2
-POLYNOMIAL( 1)%TERM(99)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(99)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(99)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(**)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(**)%COEF = ( -1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(**)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 1)%TERM(**)%COEF = (  1.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(**)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(**)%COEF = (  2.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 1
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(**)%COEF = ( -8.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 1)%TERM(**)%DEG( 1) = 2
-POLYNOMIAL( 1)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 1)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 1)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 1)%TERM(**)%COEF = ( -2.00000000000000E+00,  0.00000000000000E+00)
-
-POLYNOMIAL( 2)%NUM_TERMS =108
-POLYNOMIAL( 2)%TERM( 1)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 1)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 2)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 2)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM( 2)%COEF = ( -3.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 3)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 3)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 4)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 4)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 4)%COEF = ( -1.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 5)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 5)%COEF = (  1.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 6)%COEF = (  1.50000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 7)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 7)%COEF = (  1.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 8)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM( 8)%COEF = (  1.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM( 9)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM( 9)%COEF = (  7.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(10)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(10)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(11)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(11)%COEF = ( -6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(12)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(12)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(12)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(12)%COEF = (  9.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(13)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(13)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(13)%COEF = ( -2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(14)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(14)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(14)%COEF = ( -1.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(15)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(15)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(15)%COEF = (  2.10000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(16)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(16)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(16)%COEF = (  4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(17)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(17)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(17)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(17)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(17)%COEF = (  1.30000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(18)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(18)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(18)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(18)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(18)%COEF = ( -2.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(19)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(19)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(19)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(19)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(19)%COEF = ( -2.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(20)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(20)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(20)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(20)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(20)%COEF = ( -6.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(21)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(21)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(21)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(21)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(21)%COEF = (  6.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(22)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(22)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(22)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(22)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(22)%COEF = ( -2.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(23)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(23)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(23)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(23)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(23)%COEF = (  3.30000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(24)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(24)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(24)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(24)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(24)%COEF = ( -3.90000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(25)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(25)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(25)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(25)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(25)%COEF = (  1.08000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(26)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(26)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(26)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(26)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(26)%COEF = ( -1.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(27)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(27)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(27)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(27)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(27)%COEF = (  4.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(28)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(28)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(28)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(28)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(28)%COEF = ( -6.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(29)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(29)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(29)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(29)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(29)%COEF = (  6.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(30)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(30)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(30)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(30)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(30)%COEF = (  4.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(31)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(31)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(31)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(31)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(31)%COEF = (  1.08000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(32)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(32)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(32)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(32)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(32)%COEF = ( -1.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(33)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(33)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(33)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(33)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(33)%COEF = (  4.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(34)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(34)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(34)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(34)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(34)%COEF = ( -6.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(35)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(35)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(35)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(35)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(35)%COEF = (  6.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(36)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(36)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(36)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(36)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(36)%COEF = ( -1.92000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(37)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(37)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(37)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(37)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(37)%COEF = (  2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(38)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(38)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(38)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(38)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(38)%COEF = ( -8.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(39)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(39)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(39)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(39)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(39)%COEF = (  1.08000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(40)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(40)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(40)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(40)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(40)%COEF = ( -1.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(41)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(41)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(41)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(41)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(41)%COEF = ( -3.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(42)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(42)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(42)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(42)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(42)%COEF = ( -3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(43)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(43)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(43)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(43)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(43)%COEF = ( -3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(44)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(44)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(44)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(44)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(44)%COEF = (  2.10000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(45)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(45)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(45)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(45)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(45)%COEF = (  4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(46)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(46)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(46)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(46)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(46)%COEF = ( -2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(47)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(47)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(47)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(47)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(47)%COEF = ( -1.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(48)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(48)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(48)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(48)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(48)%COEF = (  9.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(49)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(49)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(49)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(49)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(49)%COEF = ( -2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(50)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(50)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(50)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(50)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(50)%COEF = (  1.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(51)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(51)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(51)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(51)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(51)%COEF = (  1.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(52)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(52)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(52)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(52)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(52)%COEF = ( -8.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(53)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(53)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(53)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(53)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(53)%COEF = (  1.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(54)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(54)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(54)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(54)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(54)%COEF = ( -8.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(55)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(55)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(55)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(55)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(55)%COEF = (  4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(56)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(56)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(56)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(56)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(56)%COEF = ( -2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(57)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(57)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(57)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(57)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(57)%COEF = ( -2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(58)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(58)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(58)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(58)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(58)%COEF = (  1.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(59)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(59)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(59)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(59)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(59)%COEF = ( -3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(60)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(60)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(60)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(60)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(60)%COEF = (  2.10000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(61)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(61)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(61)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(61)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(61)%COEF = ( -2.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(62)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(62)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(62)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(62)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(62)%COEF = (  1.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(63)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(63)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(63)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(63)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(63)%COEF = (  1.10000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(64)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(64)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(64)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(64)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(64)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(65)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(65)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(65)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(65)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(65)%COEF = ( -4.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(66)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(66)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(66)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(66)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(66)%COEF = (  5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(67)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(67)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(67)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(67)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(67)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(68)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(68)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(68)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(68)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(68)%COEF = (  2.70000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(69)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(69)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(69)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(69)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(69)%COEF = ( -3.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(70)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(70)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(70)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(70)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(70)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(71)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(71)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(71)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(71)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(71)%COEF = ( -9.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(72)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(72)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(72)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(72)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(72)%COEF = (  3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(73)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(73)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(73)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(73)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(73)%COEF = ( -4.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(74)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(74)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(74)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(74)%DEG( 4) = 0
-POLYNOMIAL( 2)%TERM(74)%COEF = (  5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(75)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(75)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(75)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(75)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(75)%COEF = (  1.10000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(76)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(76)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(76)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(76)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(76)%COEF = ( -3.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(77)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(77)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(77)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(77)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(77)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(78)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(78)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(78)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(78)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(78)%COEF = (  2.70000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(79)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(79)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(79)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(79)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(79)%COEF = (  5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(80)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(80)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(80)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(80)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(80)%COEF = ( -4.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(81)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(81)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(81)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(81)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(81)%COEF = ( -4.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(82)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(82)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(82)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(82)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(82)%COEF = (  2.70000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(83)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(83)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(83)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(83)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(83)%COEF = (  5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(84)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(84)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(84)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(84)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(84)%COEF = ( -3.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(85)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(85)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(85)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(85)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(85)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(86)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(86)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(86)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(86)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(86)%COEF = (  1.10000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(87)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(87)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(87)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(87)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(87)%COEF = ( -3.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(88)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(88)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(88)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(88)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(88)%COEF = (  1.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(89)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(89)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(89)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(89)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(89)%COEF = (  1.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(90)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(90)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(90)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(90)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(90)%COEF = ( -1.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(91)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(91)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(91)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(91)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(91)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(92)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(92)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(92)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(92)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(92)%COEF = (  5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(93)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(93)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(93)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(93)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(93)%COEF = (  3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(94)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(94)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(94)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(94)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(94)%COEF = ( -4.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(95)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(95)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(95)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(95)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(95)%COEF = ( -9.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(96)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(96)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(96)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(96)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(96)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(97)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(97)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(97)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(97)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(97)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(98)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(98)%DEG( 2) = 1
-POLYNOMIAL( 2)%TERM(98)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(98)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(98)%COEF = ( -4.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(99)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(99)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(99)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(99)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(99)%COEF = ( -9.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 2
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(**)%COEF = (  5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(**)%COEF = ( -1.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(**)%COEF = (  9.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(**)%COEF = (  1.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 2)%TERM(**)%COEF = ( -8.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(**)%COEF = (  3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(**)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 1
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(**)%COEF = (  5.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 2)%TERM(**)%DEG( 1) = 2
-POLYNOMIAL( 2)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 2)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 2)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 2)%TERM(**)%COEF = (  1.80000000000000E+01,  0.00000000000000E+00)
-
-POLYNOMIAL( 3)%NUM_TERMS =108
-POLYNOMIAL( 3)%TERM( 1)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 1)%COEF = (  6.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 2)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 2)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM( 2)%COEF = (  1.12000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 3)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 3)%COEF = (  1.50000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 4)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 4)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 4)%COEF = (  4.50000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 5)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 5)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 6)%COEF = ( -3.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 7)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 7)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 8)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM( 8)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM( 9)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM( 9)%COEF = ( -2.10000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(10)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(10)%COEF = (  1.50000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(11)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(11)%COEF = (  1.50000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(12)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(12)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(12)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(12)%COEF = ( -3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(13)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(13)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(13)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(14)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(14)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(14)%COEF = (  5.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(15)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(15)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(15)%COEF = ( -6.30000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(16)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(16)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(16)%COEF = ( -1.26000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(17)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(17)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(17)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(17)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(17)%COEF = ( -7.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(18)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(18)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(18)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(18)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(18)%COEF = (  1.32000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(19)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(19)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(19)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(19)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(19)%COEF = (  1.32000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(20)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(20)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(20)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(20)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(20)%COEF = (  2.70000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(21)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(21)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(21)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(21)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(21)%COEF = ( -3.24000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(22)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(22)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(22)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(22)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(22)%COEF = (  1.32000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(23)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(23)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(23)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(23)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(23)%COEF = ( -1.62000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(24)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(24)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(24)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(24)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(24)%COEF = (  1.98000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(25)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(25)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(25)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(25)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(25)%COEF = ( -4.32000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(26)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(26)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(26)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(26)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(26)%COEF = (  5.40000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(27)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(27)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(27)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(27)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(27)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(28)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(28)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(28)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(28)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(28)%COEF = (  2.70000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(29)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(29)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(29)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(29)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(29)%COEF = ( -3.24000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(30)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(30)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(30)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(30)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(30)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(31)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(31)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(31)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(31)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(31)%COEF = ( -4.32000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(32)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(32)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(32)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(32)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(32)%COEF = (  5.40000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(33)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(33)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(33)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(33)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(33)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(34)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(34)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(34)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(34)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(34)%COEF = (  2.70000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(35)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(35)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(35)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(35)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(35)%COEF = ( -3.24000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(36)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(36)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(36)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(36)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(36)%COEF = (  6.72000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(37)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(37)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(37)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(37)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(37)%COEF = ( -8.64000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(38)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(38)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(38)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(38)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(38)%COEF = (  3.60000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(39)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(39)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(39)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(39)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(39)%COEF = ( -4.32000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(40)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(40)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(40)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(40)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(40)%COEF = (  5.40000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(41)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(41)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(41)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(41)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(41)%COEF = (  1.12000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(42)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(42)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(42)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(42)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(42)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(43)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(43)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(43)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(43)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(43)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(44)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(44)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(44)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(44)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(44)%COEF = ( -6.30000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(45)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(45)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(45)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(45)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(45)%COEF = ( -1.26000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(46)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(46)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(46)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(46)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(46)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(47)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(47)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(47)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(47)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(47)%COEF = (  5.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(48)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(48)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(48)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(48)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(48)%COEF = ( -3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(49)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(49)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(49)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(49)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(49)%COEF = (  6.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(50)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(50)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(50)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(50)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(50)%COEF = ( -4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(51)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(51)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(51)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(51)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(51)%COEF = ( -4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(52)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(52)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(52)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(52)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(52)%COEF = (  2.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(53)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(53)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(53)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(53)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(53)%COEF = ( -4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(54)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(54)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(54)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(54)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(54)%COEF = (  2.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(55)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(55)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(55)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(55)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(55)%COEF = ( -1.26000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(56)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(56)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(56)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(56)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(56)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(57)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(57)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(57)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(57)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(57)%COEF = (  6.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(58)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(58)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(58)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(58)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(58)%COEF = ( -4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(59)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(59)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(59)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(59)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(59)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(60)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(60)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(60)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(60)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(60)%COEF = ( -6.30000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(61)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(61)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(61)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(61)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(61)%COEF = (  6.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(62)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(62)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(62)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(62)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(62)%COEF = ( -4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(63)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(63)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(63)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(63)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(63)%COEF = ( -5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(64)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(64)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(64)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(64)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(64)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(65)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(65)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(65)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(65)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(65)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(66)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(66)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(66)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(66)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(66)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(67)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(67)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(67)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(67)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(67)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(68)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(68)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(68)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(68)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(68)%COEF = ( -1.08000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(69)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(69)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(69)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(69)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(69)%COEF = (  1.35000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(70)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(70)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(70)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(70)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(70)%COEF = ( -2.52000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(71)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(71)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(71)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(71)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(71)%COEF = (  3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(72)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(72)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(72)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(72)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(72)%COEF = ( -1.44000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(73)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(73)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(73)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(73)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(73)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(74)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(74)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(74)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(74)%DEG( 4) = 0
-POLYNOMIAL( 3)%TERM(74)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(75)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(75)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(75)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(75)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(75)%COEF = ( -5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(76)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(76)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(76)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(76)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(76)%COEF = (  1.35000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(77)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(77)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(77)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(77)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(77)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(78)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(78)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(78)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(78)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(78)%COEF = ( -1.08000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(79)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(79)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(79)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(79)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(79)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(80)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(80)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(80)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(80)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(80)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(81)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(81)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(81)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(81)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(81)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(82)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(82)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(82)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(82)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(82)%COEF = ( -1.08000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(83)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(83)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(83)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(83)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(83)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(84)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(84)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(84)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(84)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(84)%COEF = (  1.35000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(85)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(85)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(85)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(85)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(85)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(86)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(86)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(86)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(86)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(86)%COEF = ( -5.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(87)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(87)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(87)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(87)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(87)%COEF = (  1.12000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(88)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(88)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(88)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(88)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(88)%COEF = ( -7.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(89)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(89)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(89)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(89)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(89)%COEF = ( -7.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(90)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(90)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(90)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(90)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(90)%COEF = (  4.50000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(91)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(91)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(91)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(91)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(91)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(92)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(92)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(92)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(92)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(92)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(93)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(93)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(93)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(93)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(93)%COEF = ( -1.44000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(94)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(94)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(94)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(94)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(94)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(95)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(95)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(95)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(95)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(95)%COEF = (  3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(96)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(96)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(96)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(96)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(96)%COEF = ( -2.52000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(97)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(97)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(97)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(97)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(97)%COEF = ( -2.52000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(98)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(98)%DEG( 2) = 1
-POLYNOMIAL( 3)%TERM(98)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(98)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(98)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(99)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(99)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(99)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(99)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(99)%COEF = (  3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 2
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(**)%COEF = ( -2.16000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(**)%COEF = (  5.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(**)%COEF = ( -3.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(**)%COEF = ( -4.20000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 3)%TERM(**)%COEF = (  2.80000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(**)%COEF = ( -1.44000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(**)%COEF = (  9.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 1
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(**)%COEF = ( -1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 3)%TERM(**)%DEG( 1) = 2
-POLYNOMIAL( 3)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 3)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 3)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 3)%TERM(**)%COEF = ( -7.20000000000000E+01,  0.00000000000000E+00)
-
-POLYNOMIAL( 4)%NUM_TERMS =108
-POLYNOMIAL( 4)%TERM( 1)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 1)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 1)%COEF = ( -4.00000000000000E+00,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 2)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM( 2)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 2)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM( 2)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM( 2)%COEF = ( -2.24000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 3)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM( 3)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 3)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 3)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 3)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 4)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 4)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM( 4)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 4)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 4)%COEF = ( -6.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 5)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM( 5)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 5)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 5)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 5)%COEF = (  2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 6)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM( 6)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 6)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 6)%COEF = (  3.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 7)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 7)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 7)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM( 7)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 7)%COEF = (  2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 8)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 8)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM( 8)%COEF = (  2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM( 9)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM( 9)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM( 9)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM( 9)%COEF = (  3.50000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(10)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(10)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(10)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(10)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(11)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(11)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(11)%COEF = ( -2.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(12)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(12)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(12)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(12)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(12)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(13)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(13)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(13)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(13)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(13)%COEF = ( -1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(14)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(14)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(14)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(14)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(14)%COEF = ( -1.12000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(15)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(15)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(15)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(15)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(15)%COEF = (  1.05000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(16)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(16)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(16)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(16)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(16)%COEF = (  2.10000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(17)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(17)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(17)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(17)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(17)%COEF = (  2.86000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(18)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(18)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(18)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(18)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(18)%COEF = ( -4.40000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(19)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(19)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(19)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(19)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(19)%COEF = ( -4.40000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(20)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(20)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(20)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(20)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(20)%COEF = ( -7.26000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(21)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(21)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(21)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(21)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(21)%COEF = (  9.90000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(22)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(22)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(22)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(22)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(22)%COEF = ( -4.40000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(23)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(23)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(23)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(23)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(23)%COEF = (  4.95000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(24)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(24)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(24)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(24)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(24)%COEF = ( -6.60000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(25)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(25)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(25)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(25)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(25)%COEF = (  1.00800000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(26)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(26)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(26)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(26)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(26)%COEF = ( -1.45200000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(27)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(27)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(27)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(27)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(27)%COEF = (  6.60000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(28)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(28)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(28)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(28)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(28)%COEF = ( -7.26000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(29)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(29)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(29)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(29)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(29)%COEF = (  9.90000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(30)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(30)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(30)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(30)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(30)%COEF = (  6.60000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(31)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(31)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(31)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(31)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(31)%COEF = (  1.00800000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(32)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(32)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(32)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(32)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(32)%COEF = ( -1.45200000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(33)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(33)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(33)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(33)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(33)%COEF = (  6.60000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(34)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(34)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(34)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(34)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(34)%COEF = ( -7.26000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(35)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(35)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(35)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(35)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(35)%COEF = (  9.90000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(36)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(36)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(36)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(36)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(36)%COEF = ( -1.34400000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(37)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(37)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(37)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(37)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(37)%COEF = (  2.01600000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(38)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(38)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(38)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(38)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(38)%COEF = ( -9.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(39)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(39)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(39)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(39)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(39)%COEF = (  1.00800000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(40)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(40)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(40)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(40)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(40)%COEF = ( -1.45200000000000E+03,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(41)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(41)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(41)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(41)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(41)%COEF = ( -2.24000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(42)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(42)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(42)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(42)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(42)%COEF = ( -1.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(43)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(43)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(43)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(43)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(43)%COEF = ( -1.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(44)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(44)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(44)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(44)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(44)%COEF = (  1.05000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(45)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(45)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(45)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(45)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(45)%COEF = (  2.10000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(46)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(46)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(46)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(46)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(46)%COEF = ( -1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(47)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(47)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(47)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(47)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(47)%COEF = ( -1.12000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(48)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(48)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(48)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(48)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(48)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(49)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(49)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(49)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(49)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(49)%COEF = ( -8.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(50)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(50)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(50)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(50)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(50)%COEF = (  7.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(51)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(51)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(51)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(51)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(51)%COEF = (  7.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(52)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(52)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(52)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(52)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(52)%COEF = ( -5.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(53)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(53)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(53)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(53)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(53)%COEF = (  7.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(54)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(54)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(54)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(54)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(54)%COEF = ( -5.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(55)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(55)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(55)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(55)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(55)%COEF = (  2.10000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(56)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(56)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(56)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(56)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(56)%COEF = ( -1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(57)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(57)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(57)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(57)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(57)%COEF = ( -8.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(58)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(58)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(58)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(58)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(58)%COEF = (  7.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(59)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(59)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(59)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(59)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(59)%COEF = ( -1.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(60)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(60)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(60)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(60)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(60)%COEF = (  1.05000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(61)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(61)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(61)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(61)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(61)%COEF = ( -8.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(62)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(62)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(62)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(62)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(62)%COEF = (  7.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(63)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(63)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(63)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(63)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(63)%COEF = (  1.65000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(64)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(64)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(64)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(64)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(64)%COEF = ( -2.42000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(65)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(65)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(65)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(65)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(65)%COEF = ( -3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(66)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(66)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(66)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(66)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(66)%COEF = (  5.04000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(67)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(67)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(67)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(67)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(67)%COEF = ( -2.42000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(68)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(68)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(68)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(68)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(68)%COEF = (  2.52000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(69)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(69)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(69)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(69)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(69)%COEF = ( -3.63000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(70)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(70)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(70)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(70)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(70)%COEF = (  4.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(71)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(71)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(71)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(71)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(71)%COEF = ( -6.72000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(72)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(72)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(72)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(72)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(72)%COEF = (  3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(73)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(73)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(73)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(73)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(73)%COEF = ( -3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(74)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(74)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(74)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(74)%DEG( 4) = 0
-POLYNOMIAL( 4)%TERM(74)%COEF = (  5.04000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(75)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(75)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(75)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(75)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(75)%COEF = (  1.65000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(76)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(76)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(76)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(76)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(76)%COEF = ( -3.63000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(77)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(77)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(77)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(77)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(77)%COEF = ( -2.42000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(78)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(78)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(78)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(78)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(78)%COEF = (  2.52000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(79)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(79)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(79)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(79)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(79)%COEF = (  5.04000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(80)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(80)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(80)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(80)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(80)%COEF = ( -3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(81)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(81)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(81)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(81)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(81)%COEF = ( -3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(82)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(82)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(82)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(82)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(82)%COEF = (  2.52000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(83)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(83)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(83)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(83)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(83)%COEF = (  5.04000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(84)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(84)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(84)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(84)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(84)%COEF = ( -3.63000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(85)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(85)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(85)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(85)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(85)%COEF = ( -2.42000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(86)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(86)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(86)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(86)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(86)%COEF = (  1.65000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(87)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(87)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(87)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(87)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(87)%COEF = ( -2.24000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(88)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(88)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(88)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(88)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(88)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(89)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(89)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(89)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(89)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(89)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(90)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(90)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(90)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(90)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(90)%COEF = ( -1.21000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(91)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(91)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(91)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(91)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(91)%COEF = ( -2.42000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(92)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(92)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(92)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(92)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(92)%COEF = (  5.04000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(93)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(93)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(93)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(93)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(93)%COEF = (  3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(94)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(94)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(94)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(94)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(94)%COEF = ( -3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(95)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(95)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(95)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(95)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(95)%COEF = ( -6.72000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(96)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(96)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(96)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(96)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(96)%COEF = (  4.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(97)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(97)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(97)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(97)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(97)%COEF = (  4.20000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(98)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(98)%DEG( 2) = 1
-POLYNOMIAL( 4)%TERM(98)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(98)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(98)%COEF = ( -3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(99)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(99)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(99)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(99)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(99)%COEF = ( -6.72000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 2
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(**)%COEF = (  5.04000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(**)%COEF = ( -1.12000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(**)%COEF = (  8.40000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(**)%COEF = (  7.00000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 2
-POLYNOMIAL( 4)%TERM(**)%COEF = ( -5.60000000000000E+01,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(**)%COEF = (  3.36000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 3
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(**)%COEF = ( -2.42000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 1
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 1
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(**)%COEF = (  2.80000000000000E+02,  0.00000000000000E+00)
-POLYNOMIAL( 4)%TERM(**)%DEG( 1) = 2
-POLYNOMIAL( 4)%TERM(**)%DEG( 2) = 0
-POLYNOMIAL( 4)%TERM(**)%DEG( 3) = 2
-POLYNOMIAL( 4)%TERM(**)%DEG( 4) = 1
-POLYNOMIAL( 4)%TERM(**)%COEF = (  1.68000000000000E+02,  0.00000000000000E+00)
-
-
-GENERALIZED PLP BEZOUT NUMBER (BPLP) =      5832
-BASED ON THE FOLLOWING SYSTEM PARTITION:
-P( 1) = all
-P( 2) = all
-P( 3) = all
-P( 4) = all
-
-PATH NUMBER =         1
-
-ARCLEN =  2.42922969411700E+00
-NFE =  380
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99671999987085E-01
-
-X( 1) = (  8.65072362567519E-01,  9.77189459155521E-03)
-X( 2) = (  6.81101548095946E-02, -6.47179736272263E-01)
-X( 3) = (  2.29126474029307E-01,  5.37319952678360E-01)
-X( 4) = ( -4.53924809280019E-02, -8.09194141253825E-01)
-
-X( 5) = ( -5.61822664487822E-01,  4.24148384513963E-01)
-
-PATH NUMBER =         2
-
-ARCLEN =  1.41486964336597E+00
-NFE =  390
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96622993771879E-01
-
-X( 1) = (  9.22467161771650E-01,  9.63957515745104E-02)
-X( 2) = (  2.63087840820043E-01, -5.40585947221372E-01)
-X( 3) = (  4.52113199649199E-01, -7.27508457122318E-02)
-X( 4) = ( -4.16581217590178E-01, -1.24939622968106E-02)
-
-X( 5) = ( -4.57409848292341E-01,  6.60299927317828E-02)
-
-PATH NUMBER =         3
-
-ARCLEN =  1.69866715163595E+00
-NFE =  262
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998989919E-01
-
-X( 1) = (  1.23645482383989E+01,  1.26173596299437E+00)
-X( 2) = ( -4.07060865836810E-01, -2.74380262469600E-02)
-X( 3) = (  8.71692958191237E-01, -1.34559283334261E-03)
-X( 4) = ( -5.77086769908953E+00,  2.23534348648158E+00)
-
-X( 5) = ( -5.08103859149257E-02, -5.98860426920800E-03)
-
-PATH NUMBER =         4
-
-ARCLEN =  1.15079940701003E+00
-NFE =  276
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99520209049630E-01
-
-X( 1) = (  9.74562970809837E-01,  7.25797592744228E-01)
-X( 2) = ( -7.68630066558008E-02, -1.28503468882803E-01)
-X( 3) = (  9.80012638652530E-01,  1.16250311141564E-02)
-X( 4) = ( -3.48307065663199E-01,  1.28002696095313E-01)
-
-X( 5) = ( -3.07597659794241E-01,  1.35053022798387E-01)
-
-PATH NUMBER =         5
-
-ARCLEN =  2.68913976843976E+00
-NFE =  331
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.73483949985510E-01
-
-X( 1) = (  2.36126229066287E-01,  2.55064504686641E-01)
-X( 2) = ( -8.30129990477664E-01,  2.19330024375905E-01)
-X( 3) = (  1.01516888660643E+00,  1.42988070132005E-03)
-X( 4) = ( -2.31615873293716E-01,  6.55550534531340E-01)
-
-X( 5) = ( -8.17468021129063E-01,  4.99010742644618E-01)
-
-PATH NUMBER =         6
-
-ARCLEN =  2.83972985008840E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999577577644E-01
-
-X( 1) = (  2.64433232713434E+00,  1.14396546358043E+00)
-X( 2) = (  7.25263625817996E-01, -4.29952861438261E-01)
-X( 3) = (  4.71368626240691E-01,  6.78914288919625E-02)
-X( 4) = ( -2.76172464364126E-01, -4.02585755416451E-01)
-
-X( 5) = ( -1.86178354812605E-01,  4.97205064682962E-02)
-
-PATH NUMBER =         7
-
-ARCLEN =  4.26136948671378E+00
-NFE =  510
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988908401316E-01
-
-X( 1) = (  8.67393746366514E-01,  9.32083537451179E-04)
-X( 2) = ( -4.85212992710754E-01, -2.93078979398212E+00)
-X( 3) = ( -4.06801981285331E-01,  1.49775286977828E+00)
-X( 4) = ( -3.03162943796290E-01,  6.62501241747810E-03)
-
-X( 5) = ( -4.75341518827039E-01, -8.42180901425534E-02)
-
-PATH NUMBER =         8
-
-ARCLEN =  4.73442843948541E+00
-NFE =  390
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99740782481921E-01
-
-X( 1) = (  9.23734525740182E-01, -8.86965090453598E-03)
-X( 2) = ( -1.12157349607373E+00, -9.03880384792551E-01)
-X( 3) = (  2.95391411977989E-01,  3.90037048843831E-01)
-X( 4) = ( -2.09133776074115E+00, -7.56647346356232E-01)
-
-X( 5) = ( -7.79703147556513E-01,  4.39926545243121E-01)
-
-PATH NUMBER =         9
-
-ARCLEN =  1.76072956657252E+00
-NFE =  261
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99670994710310E-01
-
-X( 1) = (  6.83838871445550E-01, -1.71654832743617E-01)
-X( 2) = (  2.33342436649043E-01, -8.83508060781202E-01)
-X( 3) = (  5.99407256470063E-01,  6.77186432052302E-01)
-X( 4) = ( -4.63629742962074E-01, -1.06913366798829E+00)
-
-X( 5) = ( -4.22537119127941E-01,  2.86356802110641E-01)
-
-PATH NUMBER =        10
-
-ARCLEN =  1.66406513466531E+00
-NFE =  337
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99516703225696E-01
-
-X( 1) = (  8.86661764026782E-01,  4.44499886600925E-02)
-X( 2) = (  1.15302862148475E+00, -5.76566661203147E-01)
-X( 3) = (  3.90654485927927E-02,  1.19784856710004E-01)
-X( 4) = ( -5.27936069270234E-01, -5.55350114552787E-02)
-
-X( 5) = ( -3.30229924555382E-01,  1.76812850555253E-01)
-
-PATH NUMBER =        11
-
-ARCLEN =  1.45156722148346E+00
-NFE =  281
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98717788909847E-01
-
-X( 1) = (  9.21875559793016E-01,  5.88154729689059E-02)
-X( 2) = (  4.28858123644765E-02, -4.76444981356004E-01)
-X( 3) = (  6.25985083653145E-01,  9.78737969303242E-03)
-X( 4) = ( -2.78282259761192E-01, -1.19625338130792E-01)
-
-X( 5) = ( -4.89220647400900E-01,  5.12476154185405E-02)
-
-PATH NUMBER =        12
-
-ARCLEN =  1.28576545159377E+00
-NFE =  403
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99808835721498E-01
-
-X( 1) = (  1.17323208448902E+00,  4.53644663118376E-01)
-X( 2) = (  1.20424772593061E-01, -1.46237494952033E-01)
-X( 3) = (  9.21127175019238E-01,  4.96694225104017E-02)
-X( 4) = ( -2.74971204677312E-01, -3.73326894281140E-01)
-
-X( 5) = ( -3.27998535783211E-01,  1.27163848077554E-01)
-
-PATH NUMBER =        13
-
-ARCLEN =  1.61395372422212E+00
-NFE =  371
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997773697719E-01
-
-X( 1) = (  7.10118517108715E-01,  1.54863776889814E+00)
-X( 2) = (  6.40752074555531E-01, -1.20519769851369E-03)
-X( 3) = (  6.43971017747738E-01,  1.03105446721589E+00)
-X( 4) = ( -5.31834490330478E-01,  4.67607151155980E-02)
-
-X( 5) = ( -1.00588337611093E-01,  1.52429155047345E-01)
-
-PATH NUMBER =        14
-
-ARCLEN =  1.24043674820330E+00
-NFE =  360
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98160238350788E-01
-
-X( 1) = (  5.68979466277138E-01,  8.50815616800806E-01)
-X( 2) = (  7.23399144170192E-02,  8.49811306054174E-03)
-X( 3) = (  9.87411924406409E-01,  2.73533540132281E-02)
-X( 4) = ( -8.08325142574537E-01,  2.22878073397678E-01)
-
-X( 5) = ( -2.38545531517467E-01,  1.95986965969584E-01)
-
-PATH NUMBER =        15
-
-ARCLEN =  1.09131112283723E+01
-NFE =  346
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99819018366380E-01
-
-X( 1) = (  9.01073201582529E-01,  6.24784276934555E-03)
-X( 2) = ( -2.21896111337923E+00,  8.63712325548029E-01)
-X( 3) = (  1.54447804143849E+00, -1.35060399144293E-01)
-X( 4) = ( -7.96335571828054E-01, -1.24676726223594E-01)
-
-X( 5) = ( -1.63305728064501E+00, -1.65923977333914E+00)
-
-PATH NUMBER =        16
-
-ARCLEN =  3.50014224461940E+00
-NFE =  348
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99993826611704E-01
-
-X( 1) = (  9.29415032685488E-01,  1.34942628793726E-01)
-X( 2) = (  9.25045319091213E-01, -2.13004542309544E+00)
-X( 3) = ( -1.25087918492713E-01,  2.51553753383288E-01)
-X( 4) = (  4.54125052326938E-01, -3.31316965208851E-01)
-
-X( 5) = ( -3.48149254874538E-01, -6.06151219828614E-02)
-
-PATH NUMBER =        17
-
-ARCLEN =  2.55594856778467E+01
-NFE =  366
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999996825E-01
-
-X( 1) = (  3.52010757923686E+01, -4.30331482323467E+01)
-X( 2) = (  7.75113370042107E+01,  1.55793638078858E+02)
-X( 3) = (  8.97830429161328E-01,  4.09205894662801E-03)
-X( 4) = ( -7.70452813058196E-02,  5.33695711618689E-02)
-
-X( 5) = (  1.53229918984844E-03,  7.61276788674145E-03)
-
-PATH NUMBER =        18
-
-ARCLEN =  3.33548387587975E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999965E-01
-
-X( 1) = (  7.52895079789368E-02,  9.28580230201290E-03)
-X( 2) = (  2.29197128268022E+01, -9.12160223630235E+00)
-X( 3) = (  1.08380391765877E+00,  1.38355767986906E-02)
-X( 4) = ( -1.23020280120853E+02,  8.53278609096598E+01)
-
-X( 5) = ( -7.51379321926925E-03,  3.67400151873073E-03)
-
-PATH NUMBER =        19
-
-ARCLEN =  1.36652840067144E+00
-NFE =  298
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92955453919614E-01
-
-X( 1) = (  7.55156362873309E-01,  3.28772078218577E-02)
-X( 2) = (  5.05522460356461E-01, -1.46039969270296E-01)
-X( 3) = (  2.97953504738225E-01, -1.78040549298818E-02)
-X( 4) = ( -3.98808531641214E-01, -5.91608694473879E-01)
-
-X( 5) = ( -4.50983530605990E-01,  3.79670576316944E-01)
-
-PATH NUMBER =        20
-
-ARCLEN =  1.22133089275935E+00
-NFE =  200
-IFLAG2 =  6
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.14493280975871E-01
-
-X( 1) = (  8.78742336764458E-01,  7.12155152663137E-01)
-X( 2) = (  5.32414263995800E-01, -1.85983413336457E-01)
-X( 3) = (  7.48716649335394E-01, -1.32417315063353E-01)
-X( 4) = ( -6.41999768991261E-01, -7.13275784531920E-01)
-
-X( 5) = ( -2.59766831268122E-01,  1.91413160688151E-01)
-
-PATH NUMBER =        21
-
-ARCLEN =  1.32044389998441E+00
-NFE =  177
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.31931288619579E-12
-
-X( 1) = ( -2.91985325360558E+09, -6.22644073235569E+10)
-X( 2) = (  5.03900312569756E-01, -2.86511595506713E-01)
-X( 3) = ( -4.79149526700860E+10, -2.19961269693350E+10)
-X( 4) = (  3.36268611213204E+09,  5.07219501140830E+10)
-
-X( 5) = (  3.86839014597171E-12, -5.82437749288914E-12)
-
-PATH NUMBER =        22
-
-ARCLEN =  1.46452130987038E+00
-NFE =  444
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997859930472E-01
-
-X( 1) = (  1.77163557521889E-01,  8.87847000040321E-01)
-X( 2) = (  6.83195121170228E-01,  1.47859242978150E-02)
-X( 3) = (  1.21367740802282E+00,  1.06485052363129E+00)
-X( 4) = ( -3.94392014667859E-01,  4.20489015616158E-02)
-
-X( 5) = ( -1.15978662642017E-01,  1.69551427098464E-01)
-
-PATH NUMBER =        23
-
-ARCLEN =  1.62440102093889E+00
-NFE =  413
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995677891688E-01
-
-X( 1) = (  2.20679169080693E-01,  7.99363127363204E-01)
-X( 2) = (  4.98618690240664E-01,  1.73060019606631E-02)
-X( 3) = (  1.47617691356020E+00,  4.94324944849101E-01)
-X( 4) = ( -1.37235979714411E+00,  5.18054765020966E-01)
-
-X( 5) = ( -1.49564951750149E-01,  1.45950289931825E-01)
-
-PATH NUMBER =        24
-
-ARCLEN =  2.91395912514986E+00
-NFE =  428
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998318965193E-01
-
-X( 1) = (  6.71592808542493E-01,  2.88665403134044E-02)
-X( 2) = ( -3.36657760391341E-02, -2.96449160658874E-01)
-X( 3) = (  9.42648940529365E-01, -2.59710679203867E-01)
-X( 4) = ( -1.65277211892824E+00,  2.16830068772279E+00)
-
-X( 5) = ( -2.85639635750702E-01,  1.20559008479624E-02)
-
-PATH NUMBER =        25
-
-ARCLEN =  2.14696417019997E+00
-NFE =  678
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99970174600240E-01
-
-X( 1) = (  4.82703171668570E-01,  3.32795964247251E-01)
-X( 2) = (  8.87024607926211E-01, -2.68383388875592E-01)
-X( 3) = (  3.83134570194148E-01,  6.96170399311984E-01)
-X( 4) = ( -1.70527850941321E-01, -1.91143679002178E-01)
-
-X( 5) = ( -1.88178925516145E-01,  2.54921566507819E-01)
-
-PATH NUMBER =        26
-
-ARCLEN =  1.15756262864460E+02
-NFE =  504
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99874471105252E-01
-
-X( 1) = (  9.98888643489274E-01,  4.06200334566997E-03)
-X( 2) = (  6.14776344906241E-01,  2.09219734163654E+00)
-X( 3) = (  7.70645024954192E-03, -1.07539091106347E-02)
-X( 4) = (  7.74833540344368E-01,  1.08273926078115E+00)
-
-X( 5) = ( -4.83726570473038E-02,  5.00642914055629E-01)
-
-PATH NUMBER =        27
-
-ARCLEN =  3.74172130759180E+00
-NFE =  494
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999930989215E-01
-
-X( 1) = (  9.89911577561135E-01,  7.09764432655714E-02)
-X( 2) = (  5.01387377632288E+00, -1.25564009135442E+01)
-X( 3) = (  1.28044197842998E-02,  7.00924180910206E-02)
-X( 4) = ( -4.76793175824259E+00, -1.11444382839771E+01)
-
-X( 5) = ( -9.63753564867896E-02, -1.44968243076666E-02)
-
-PATH NUMBER =        28
-
-ARCLEN =  1.87335502208901E+00
-NFE =  309
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999478164735E-01
-
-X( 1) = (  3.80337839074701E-01,  2.92089793802029E-01)
-X( 2) = (  4.81342459567909E-01, -4.57571124276473E-01)
-X( 3) = (  1.42233825225955E+00,  6.97510866018993E-01)
-X( 4) = ( -3.61981185029273E+00, -1.97690273315404E+00)
-
-X( 5) = ( -1.06827387502104E-01,  1.59637288201102E-01)
-
-PATH NUMBER =        29
-
-ARCLEN =  1.28441853041629E+00
-NFE =  174
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.24623146396251E-11
-
-X( 1) = (  6.43034995101705E+09, -1.64682498967148E+10)
-X( 2) = (  5.00079557082387E-01,  2.88447873149891E-01)
-X( 3) = ( -1.14988640396378E+10, -1.26824499893210E+10)
-X( 4) = ( -7.46898518287482E+09,  1.62718881659884E+10)
-
-X( 5) = (  3.95557187265333E-12, -2.35526897464367E-11)
-
-PATH NUMBER =        30
-
-ARCLEN =  1.90441007891526E+00
-NFE =  213
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.04451999041150E-07
-
-X( 1) = (  5.19568589661563E-01,  1.02188220947192E+00)
-X( 2) = (  4.78237834403257E-01, -1.00910319488557E-01)
-X( 3) = (  2.18055058192980E+06,  7.55427400905471E+05)
-X( 4) = ( -3.14690857487211E+06, -1.31086812120358E+06)
-
-X( 5) = ( -1.70268633250810E-07,  1.56520950912579E-07)
-
-PATH NUMBER =        31
-
-ARCLEN =  1.33904197678641E+00
-NFE =  331
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99287335774710E-01
-
-X( 1) = (  6.69331777032423E-02,  6.35884807782860E-01)
-X( 2) = (  9.43323482111697E-01,  5.73336507391999E-02)
-X( 3) = (  5.49753412323429E-01,  3.08654646399214E-01)
-X( 4) = ( -1.79800434386696E-01, -1.72702662576371E-01)
-
-X( 5) = ( -1.39428714054542E-01,  2.66461152997341E-01)
-
-PATH NUMBER =        32
-
-ARCLEN =  1.74614291532071E+00
-NFE =  395
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99963358764743E-01
-
-X( 1) = (  8.85572238086586E-01,  3.57820417531538E-01)
-X( 2) = ( -1.04898616759593E-01,  3.16839616856628E-02)
-X( 3) = (  1.03849224153229E+00,  3.68396385310242E-02)
-X( 4) = ( -4.96896718832073E-01,  1.09634365985164E+00)
-
-X( 5) = ( -3.22542278741242E-01,  8.40761906065372E-02)
-
-PATH NUMBER =        33
-
-ARCLEN =  2.15200444315803E+00
-NFE =  302
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.91642344455898E-10
-
-X( 1) = ( -3.22472594179135E+09, -2.89700131650614E+09)
-X( 2) = (  5.45850232057468E-01, -2.44477485676835E-01)
-X( 3) = ( -3.20978977647553E+09,  1.14120887173995E+09)
-X( 4) = (  2.84223738720667E+09,  3.16086103975810E+09)
-
-X( 5) = (  1.02830011758197E-10, -2.77873274520321E-11)
-
-PATH NUMBER =        34
-
-ARCLEN =  2.19600994686392E+00
-NFE =  370
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999830740164E-01
-
-X( 1) = ( -1.73540665689446E+00,  4.13442452012413E+00)
-X( 2) = (  5.05360085011565E-01, -4.84974843054496E-01)
-X( 3) = (  4.98865629510535E-01,  1.94901873435851E-01)
-X( 4) = (  2.18430955115407E+00, -4.39111078036983E+00)
-
-X( 5) = (  3.13262745934276E-02,  1.30454429287503E-01)
-
-PATH NUMBER =        35
-
-ARCLEN =  1.35658061387412E+01
-NFE =  433
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92710131236591E-01
-
-X( 1) = (  5.78494621633968E-01, -7.69296696069375E-01)
-X( 2) = (  1.04775023933647E+00,  2.13753393069402E-01)
-X( 3) = ( -3.56442405297589E-01, -1.80516536964960E-01)
-X( 4) = (  4.49294841850544E-01,  7.90101045642824E-01)
-
-X( 5) = ( -2.11699427778421E+00, -4.26580320951915E-01)
-
-PATH NUMBER =        36
-
-ARCLEN =  1.74054303547273E+00
-NFE =  340
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99481023586433E-01
-
-X( 1) = (  4.88250057185577E-01,  2.98465159913991E-01)
-X( 2) = (  1.70744814088342E-01, -2.29037379336840E-01)
-X( 3) = (  7.53032126393607E-01, -3.91995501613320E-02)
-X( 4) = ( -8.58043605202517E-01, -1.36380915719008E+00)
-
-X( 5) = ( -2.90100113392901E-01,  3.96546675432161E-01)
-
-PATH NUMBER =        37
-
-ARCLEN =  1.48221601978205E+00
-NFE =  395
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96431620837301E-01
-
-X( 1) = (  1.42368125767247E-01,  3.53064273876856E-02)
-X( 2) = (  8.61631045022482E-01, -3.13071004296023E-02)
-X( 3) = ( -5.26213147515783E-02,  3.00938574102343E-01)
-X( 4) = (  1.72500406098824E-01, -9.10657731474447E-01)
-
-X( 5) = (  4.58661362984571E-03,  4.88563161174952E-01)
-
-PATH NUMBER =        38
-
-ARCLEN =  2.40220843908475E+00
-NFE =  296
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999984E-01
-
-X( 1) = ( -2.70856572964043E+01,  1.21408538162223E+02)
-X( 2) = (  4.71665384902525E-01, -9.31706240175083E-02)
-X( 3) = (  6.72197004001597E-01,  8.86395488785381E-01)
-X( 4) = (  7.63866257005805E+01, -2.14351769549658E+02)
-
-X( 5) = (  2.23380679628650E-03,  4.14591576850316E-03)
-
-PATH NUMBER =        39
-
-ARCLEN =  2.35047529580158E+00
-NFE =  273
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999974E-01
-
-X( 1) = ( -3.90741081710862E-02,  2.81042082406025E-02)
-X( 2) = (  1.09433234451610E+00, -2.12349833811333E-02)
-X( 3) = (  1.39532367084595E+02,  2.26001496735487E+01)
-X( 4) = ( -1.73729418519508E+02, -9.23690248523694E+01)
-
-X( 5) = ( -3.38687225855266E-03,  2.51028049180461E-03)
-
-PATH NUMBER =        40
-
-ARCLEN =  1.40662998002869E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99741199024468E-01
-
-X( 1) = ( -6.71016901115766E-01,  8.26807009319332E-01)
-X( 2) = (  4.99171368376442E-01,  2.27720942012163E-01)
-X( 3) = (  1.34021499419772E+00,  9.44010765925079E-01)
-X( 4) = (  5.47081117260779E-01, -6.35425019267711E-01)
-
-X( 5) = ( -5.27129132781499E-02,  2.40193343891629E-01)
-
-PATH NUMBER =        41
-
-ARCLEN =  1.46887758120058E+00
-NFE =  425
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99151739576880E-01
-
-X( 1) = (  7.35070158608590E-02,  7.17339687862321E-01)
-X( 2) = (  7.15967836096000E-01,  5.60995965858748E-01)
-X( 3) = (  7.54935818943647E-01, -8.39554569604618E-02)
-X( 4) = ( -4.07420499634104E-01, -1.86308319899397E-01)
-
-X( 5) = ( -1.29788128307143E-01,  2.85281317867768E-01)
-
-PATH NUMBER =        42
-
-ARCLEN =  3.09418058425942E+00
-NFE =  247
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.46316972987230E-10
-
-X( 1) = ( -7.52826800965416E+10,  4.02922296209451E+10)
-X( 2) = ( -2.15182373262046E+10, -1.61761532737309E+10)
-X( 3) = (  4.88171912324798E-01, -2.11983465785283E-01)
-X( 4) = (  1.45538221030726E+11, -1.14005702386584E+11)
-
-X( 5) = (  5.52703816416623E-12,  4.49305414922108E-13)
-
-PATH NUMBER =        43
-
-ARCLEN =  2.78869841510505E+00
-NFE =  256
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.47008793363333E-09
-
-X( 1) = ( -6.62196675623870E+07,  4.89673754527202E+08)
-X( 2) = (  4.40690606061522E-01, -2.84041361171116E-01)
-X( 3) = (  2.25878236987283E+08,  2.27112268393718E+08)
-X( 4) = (  2.37644267545412E+08, -7.24014603781425E+08)
-
-X( 5) = ( -5.98300253199131E-11,  9.79773663676436E-10)
-
-PATH NUMBER =        44
-
-ARCLEN =  2.36802167170521E+00
-NFE =  519
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988610635108E-01
-
-X( 1) = (  4.11643401305760E-01,  8.20650825085329E-02)
-X( 2) = (  3.62153188496140E-01, -4.21056824877940E-01)
-X( 3) = (  1.41135884277498E+00, -4.25231005681751E-02)
-X( 4) = ( -2.39192490274921E+00, -4.68820642584194E-01)
-
-X( 5) = ( -2.33733304612489E-01,  1.44536949553309E-01)
-
-PATH NUMBER =        45
-
-ARCLEN =  1.99241994585594E+00
-NFE =  372
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997347622351E-01
-
-X( 1) = ( -1.62699174071352E-01,  4.19798086021867E-02)
-X( 2) = (  7.43654674170583E-01,  1.47925044964248E-02)
-X( 3) = (  7.39823125388846E-01,  5.12502587143778E-01)
-X( 4) = ( -1.67064834065300E+00, -1.03647880715100E+00)
-
-X( 5) = ( -7.73429934406026E-02,  2.68941406762720E-01)
-
-PATH NUMBER =        46
-
-ARCLEN =  1.66504402497600E+00
-NFE =  420
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94604015745585E-01
-
-X( 1) = (  1.06441558826837E-01, -3.43668982596342E-01)
-X( 2) = (  7.89887365022662E-01, -1.49739423120285E-02)
-X( 3) = ( -1.47963516920108E-01,  2.61921800416196E-01)
-X( 4) = (  3.36759363722314E-01, -5.08090615950332E-01)
-
-X( 5) = (  1.73724799557898E-01,  7.23012173117046E-01)
-
-PATH NUMBER =        47
-
-ARCLEN =  3.74803582003926E+00
-NFE =  256
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.59723117503654E-09
-
-X( 1) = ( -2.75912901682504E+08,  1.00039035010821E+08)
-X( 2) = (  5.17263585390927E-01, -2.86081914720513E-01)
-X( 3) = ( -1.51926792658636E+08,  2.65194731223857E+08)
-X( 4) = (  6.16511310138919E+08, -1.24919401123758E+08)
-
-X( 5) = (  1.12025335126495E-09,  5.58613647201091E-10)
-
-PATH NUMBER =        48
-
-ARCLEN =  1.76202836266273E+00
-NFE =  399
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99993437903302E-01
-
-X( 1) = (  1.89255106430316E+00,  2.07109915744382E-01)
-X( 2) = ( -6.22979803153622E-01,  1.04923251468743E-01)
-X( 3) = (  8.74952046670013E-01,  3.61324418186493E-03)
-X( 4) = ( -1.59946623491085E-01, -1.65426689162952E-01)
-
-X( 5) = ( -3.86793150350321E-01, -2.84715908056647E-02)
-
-PATH NUMBER =        49
-
-ARCLEN =  1.92283568801252E+00
-NFE =  454
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99801018896565E-01
-
-X( 1) = (  5.49746364778848E-01,  2.60279231529680E-01)
-X( 2) = ( -2.10222241259096E-01,  6.82775407691297E-01)
-X( 3) = (  1.13869318525392E+00,  1.12477075577763E-01)
-X( 4) = (  2.39946757339843E-01,  1.50282186744253E-01)
-
-X( 5) = ( -3.88069520966420E-01,  3.90083358150355E-01)
-
-PATH NUMBER =        50
-
-ARCLEN =  2.65108766645133E+00
-NFE =  353
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.91979548908924E-01
-
-X( 1) = (  2.34784590018665E-01, -5.58961365743553E-01)
-X( 2) = (  1.02430072695175E+00, -4.21988158412077E-02)
-X( 3) = ( -1.01704992426174E+00, -1.06267701230683E+00)
-X( 4) = (  5.23898201224931E-02,  1.22051140802903E-01)
-
-X( 5) = (  7.22458409827532E-01, -5.26409524909406E-01)
-
-PATH NUMBER =        51
-
-ARCLEN =  5.18475597211195E+00
-NFE =  627
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999620951343E-01
-
-X( 1) = ( -2.19359393190699E+00, -1.37241568880453E+00)
-X( 2) = ( -4.04385328837790E-01,  4.08545961355002E-02)
-X( 3) = (  8.72217896191084E-01,  6.63196898948406E-04)
-X( 4) = (  4.46554188595789E+00,  1.02794161071697E+00)
-
-X( 5) = (  1.79140075474454E-01, -1.22174894406643E-01)
-
-PATH NUMBER =        52
-
-ARCLEN =  2.78666230512248E+00
-NFE =  383
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999765689336E-01
-
-X( 1) = ( -4.74246439534018E+00,  6.91875522620785E-01)
-X( 2) = ( -4.23133166655291E+00,  6.68936956785913E+00)
-X( 3) = (  5.46075369772814E-01,  2.65488672964021E-01)
-X( 4) = (  5.44249695246566E-01, -2.11706110841532E-01)
-
-X( 5) = (  5.51269166991043E-02,  2.83166619202323E-02)
-
-PATH NUMBER =        53
-
-ARCLEN =  5.52584738111135E+00
-NFE =  395
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99324562743865E-01
-
-X( 1) = (  6.98669212836316E-01, -1.84487505333776E-01)
-X( 2) = ( -5.17468604074788E-01, -1.84784626493151E-01)
-X( 3) = (  8.35189636538538E-01,  1.43442300945080E-01)
-X( 4) = ( -9.32278228129807E-01, -2.28585296249637E-01)
-
-X( 5) = ( -6.98790483879321E-01,  2.27791473178044E-01)
-
-PATH NUMBER =        54
-
-ARCLEN =  4.44459370788308E+00
-NFE =  571
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999915412549E-01
-
-X( 1) = (  9.01359656983113E-01, -2.36642474017343E-02)
-X( 2) = ( -1.35342694212389E-01, -1.44137612025587E-01)
-X( 3) = (  2.45746144731854E+00,  1.94060529710700E+00)
-X( 4) = (  1.15512668412885E+00,  1.65487842519598E+00)
-
-X( 5) = ( -1.90198303326959E-01,  6.29621093260153E-02)
-
-PATH NUMBER =        55
-
-ARCLEN =  2.47129265485448E+00
-NFE =  249
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92110172513362E-01
-
-X( 1) = (  3.86637906236928E-01, -6.29540441760963E-01)
-X( 2) = (  8.31179865596051E-01, -2.37617125979762E-02)
-X( 3) = ( -3.21855114752991E-01,  3.22053820384154E-01)
-X( 4) = (  2.44962276642484E-01, -2.03555778657689E-01)
-
-X( 5) = (  1.57499621658885E-01,  1.11886857287019E+00)
-
-PATH NUMBER =        56
-
-ARCLEN =  1.74949150303137E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995525794488E-01
-
-X( 1) = (  4.27412375282066E-01,  2.16759165828293E-01)
-X( 2) = (  4.01594954026038E-01, -5.52998396183953E-01)
-X( 3) = (  9.29350705747230E-01,  2.26981748993982E+00)
-X( 4) = (  1.41813207619721E+00, -1.07618324788398E+00)
-
-X( 5) = ( -1.11742247876056E-01,  2.52477795847764E-01)
-
-PATH NUMBER =        57
-
-ARCLEN =  1.57618379526684E+00
-NFE =  342
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90753173135238E-01
-
-X( 1) = (  6.53003451120108E-01,  3.24908564134187E-01)
-X( 2) = (  4.42895727081947E-01,  3.95057546863230E-01)
-X( 3) = (  9.56048342172485E-01, -8.39216982273262E-01)
-X( 4) = ( -4.27336650442118E-01, -7.13466574040492E-01)
-
-X( 5) = ( -4.80035249885505E-01,  2.42585259322195E-01)
-
-PATH NUMBER =        58
-
-ARCLEN =  1.99214447778968E+00
-NFE =  450
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99763719448220E-01
-
-X( 1) = ( -9.50745870889390E-02,  1.09185186278258E-01)
-X( 2) = (  1.32529225023688E+00,  7.26002927062376E-01)
-X( 3) = (  4.21224472623821E-01, -1.39946348776114E-01)
-X( 4) = (  6.99173092740745E-01, -5.79567440913478E-02)
-
-X( 5) = ( -1.03567802521455E-01,  4.38924500898812E-01)
-
-PATH NUMBER =        59
-
-ARCLEN =  2.07888593264767E+00
-NFE =  343
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99819361839395E-01
-
-X( 1) = ( -8.05018527703470E-02,  5.08165755368994E-01)
-X( 2) = (  8.40843588915213E-01,  4.61118142982036E-01)
-X( 3) = (  1.05305633477242E+00, -3.20475553838018E-01)
-X( 4) = (  1.01628554093647E-01, -1.86779252090924E-01)
-
-X( 5) = ( -2.20874901597499E-01,  3.20960703628463E-01)
-
-PATH NUMBER =        60
-
-ARCLEN =  3.59965410010965E+00
-NFE =  414
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.86551612256979E-01
-
-X( 1) = ( -1.59932877901170E-01,  8.69025078240810E-02)
-X( 2) = ( -4.79587131283863E-01, -2.14797866028168E-01)
-X( 3) = (  7.78151494794802E-01,  9.85956302184507E-02)
-X( 4) = (  5.10380662012491E-01, -3.36947621200117E-01)
-
-X( 5) = (  5.14571610188609E-01,  2.14135652043076E+00)
-
-PATH NUMBER =        61
-
-ARCLEN =  4.46256716350537E+00
-NFE =  270
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999979E-01
-
-X( 1) = (  8.84805867195834E-01, -1.93902460605339E-01)
-X( 2) = ( -1.84808633770684E-01, -1.78223625323026E-03)
-X( 3) = ( -1.19166875537819E+01,  2.48156949745139E+01)
-X( 4) = (  8.90884798270270E-01,  1.93278981770617E-01)
-
-X( 5) = (  1.04361444762068E-02,  2.47827362100998E-02)
-
-PATH NUMBER =        62
-
-ARCLEN =  3.23810843606308E+00
-NFE =  247
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.65892890400526E-10
-
-X( 1) = (  1.03744460169949E+09,  5.49063014490342E+08)
-X( 2) = (  4.96826988581061E-01,  2.88306679842063E-01)
-X( 3) = ( -1.26086111088648E+09, -9.28645193048775E+08)
-X( 4) = (  8.86920486068722E+08,  4.35857540239265E+08)
-
-X( 5) = (  6.55938119846575E-11, -5.92968714440475E-10)
-
-PATH NUMBER =        63
-
-ARCLEN =  3.32229095534836E+00
-NFE =  266
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.04927599199011E-08
-
-X( 1) = ( -1.11774961498156E-01, -2.54144351968423E-01)
-X( 2) = (  7.27611892467223E-01,  9.21387042962291E-02)
-X( 3) = (  7.97748237450871E+06, -8.62636385607747E+06)
-X( 4) = ( -9.48187370061487E+06,  2.52090067566810E+05)
-
-X( 5) = ( -5.82007286916081E-08, -3.27505462433897E-08)
-
-PATH NUMBER =        64
-
-ARCLEN =  2.07655332057680E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99305925139648E-01
-
-X( 1) = (  7.63678062246389E-01, -1.20202820347801E-01)
-X( 2) = ( -1.80031391357709E-01, -7.74634567718291E-01)
-X( 3) = (  6.75579589222792E-01,  5.64911545315546E-01)
-X( 4) = ( -1.22893335167336E-01, -5.96368285884174E-01)
-
-X( 5) = ( -5.95999342148609E-01,  1.68885116071969E-01)
-
-PATH NUMBER =        65
-
-ARCLEN =  2.01994878089809E+00
-NFE =  358
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999070120051E-01
-
-X( 1) = (  5.10567402448688E-01,  1.74844523046151E-01)
-X( 2) = ( -7.06882788123723E-01, -1.12206022414172E+00)
-X( 3) = (  1.83172546644498E+00,  2.87412314959910E+00)
-X( 4) = (  6.52595579426216E-01, -2.62016970708327E-01)
-
-X( 5) = ( -1.76870656642880E-01,  1.73105097116717E-01)
-
-PATH NUMBER =        66
-
-ARCLEN =  2.57308951400035E+00
-NFE =  327
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991136177231E-01
-
-X( 1) = (  8.67531708659020E-01,  1.31130411527190E-02)
-X( 2) = ( -1.95780607585686E-01,  1.67985466234596E-01)
-X( 3) = (  1.95886596423444E+00,  2.75672550249906E-01)
-X( 4) = (  2.21025581700049E-01, -1.03619191208208E+00)
-
-X( 5) = ( -3.64891968430645E-01,  1.25957547124880E-01)
-
-PATH NUMBER =        67
-
-ARCLEN =  2.38540455439406E+00
-NFE =  379
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99844326404055E-01
-
-X( 1) = (  9.02209442330761E-02,  2.38515637702887E-01)
-X( 2) = (  3.62374893695042E-01,  1.18543381958395E+00)
-X( 3) = (  9.20204018097453E-01,  7.23293907068037E-01)
-X( 4) = (  7.47656903293078E-01,  1.49940039836865E-01)
-
-X( 5) = ( -4.81569961693953E-02,  3.28503653835077E-01)
-
-PATH NUMBER =        68
-
-ARCLEN =  3.43206472361756E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999494397E-01
-
-X( 1) = ( -1.45612455251344E-01,  1.09370714100190E-02)
-X( 2) = ( -7.75271881363880E+00, -2.30182983009050E+01)
-X( 3) = ( -2.35152797148535E+01,  2.89854425775291E+01)
-X( 4) = (  8.90653701769487E-01,  2.79864788884260E-03)
-
-X( 5) = (  3.13779711310252E-02,  2.26853143532449E-02)
-
-PATH NUMBER =        69
-
-ARCLEN =  2.99553200557030E+00
-NFE =  473
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988750808207E-01
-
-X( 1) = (  4.34743372212008E-01,  1.75911704122053E-01)
-X( 2) = ( -9.00821851269358E-02, -5.29133263047710E-01)
-X( 3) = (  1.35142989444975E+00,  9.35327191583733E-01)
-X( 4) = (  8.58791143531785E-01, -3.18368344988739E-01)
-
-X( 5) = ( -3.72598952404174E-01,  2.10211582167908E-01)
-
-PATH NUMBER =        70
-
-ARCLEN =  3.75293471368273E+00
-NFE =  350
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.59591701368339E-10
-
-X( 1) = ( -9.88608602516215E+08, -5.73310930922533E+08)
-X( 2) = (  5.95241810823706E-01, -3.29056431255568E-01)
-X( 3) = ( -1.87423285721273E+09, -1.66153195302904E+09)
-X( 4) = ( -1.18072032956110E+09,  1.44490012435913E+09)
-
-X( 5) = (  2.20855749649956E-10, -1.46148317785918E-10)
-
-PATH NUMBER =        71
-
-ARCLEN =  7.89041084332371E+00
-NFE =  289
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.35511202689692E-09
-
-X( 1) = ( -1.65737981159004E+08, -9.09113136036758E+07)
-X( 2) = (  5.09723406206605E-01,  2.69001111492685E-01)
-X( 3) = (  9.24251664888034E+07,  1.00018164739667E+08)
-X( 4) = ( -7.22957203426046E+06,  4.08440445564646E+07)
-
-X( 5) = (  4.92630407403520E-09,  4.90249834359056E-09)
-
-PATH NUMBER =        72
-
-ARCLEN =  9.13183278364124E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99510932623605E-01
-
-X( 1) = (  9.84058323339193E-01, -5.04976770574448E-01)
-X( 2) = (  2.09651700656967E-01, -1.07001479570575E+00)
-X( 3) = ( -6.78472461571739E-01,  1.20574040122083E+00)
-X( 4) = (  8.56662935777245E-01, -7.00488449909865E-01)
-
-X( 5) = ( -5.20178202688683E-01,  2.93837407119399E+00)
-
-PATH NUMBER =        73
-
-ARCLEN =  2.74646397699946E+00
-NFE =  351
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99982738103975E-01
-
-X( 1) = (  8.71723015956696E-01, -1.91416700833033E-02)
-X( 2) = ( -8.07217892747364E-01,  4.40489053419504E-01)
-X( 3) = (  1.61935145923338E+00,  6.67339678515227E-01)
-X( 4) = ( -9.64408468331154E-02, -2.18162447772348E-01)
-
-X( 5) = ( -4.08596118808562E-01,  2.54916669405230E-01)
-
-PATH NUMBER =        74
-
-ARCLEN =  1.82538829860759E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99471073579368E-01
-
-X( 1) = (  5.68395461270419E-01,  2.45993194396340E-01)
-X( 2) = (  1.14111961715798E+00, -1.22803823097886E+00)
-X( 3) = ( -4.18021945295253E-01,  1.17205332416034E+00)
-X( 4) = (  4.06092442267666E-01, -3.89179923795708E-01)
-
-X( 5) = ( -2.20314797979310E-01,  3.05081209856319E-01)
-
-PATH NUMBER =        75
-
-ARCLEN =  1.33632669541669E+00
-NFE =  266
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99817125341880E-01
-
-X( 1) = (  8.52085003146430E-01,  2.12840119352888E-01)
-X( 2) = ( -1.91274141194235E-01,  2.41590728540629E-01)
-X( 3) = (  1.05092454364451E+00,  1.67455205907723E-01)
-X( 4) = (  1.58095229135720E-01, -3.15544995078660E-01)
-
-X( 5) = ( -4.62327055453246E-01,  2.61066994716999E-01)
-
-PATH NUMBER =        76
-
-ARCLEN =  1.21965546861681E+00
-NFE =  433
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99610406041767E-01
-
-X( 1) = (  8.24839913370389E-01,  3.76668818300363E-01)
-X( 2) = ( -2.44405456582274E-01,  2.67354147451504E-01)
-X( 3) = (  9.39622369673107E-01,  2.79755839912427E-02)
-X( 4) = ( -8.18838084692989E-02,  1.90785525186336E-01)
-
-X( 5) = ( -4.36325729906306E-01,  2.27265272110552E-01)
-
-PATH NUMBER =        77
-
-ARCLEN =  4.77606069339632E+00
-NFE =  206
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.27044927208701E-09
-
-X( 1) = (  8.92348042952264E-01, -8.02825365482995E-03)
-X( 2) = (  2.72460949166975E+07, -1.18697232064073E+08)
-X( 3) = ( -1.45713682429725E+08,  1.56931187134798E+08)
-X( 4) = (  1.35420155053076E-01,  3.20341015375433E-02)
-
-X( 5) = (  3.07010099078755E-09,  5.57772481478945E-09)
-
-PATH NUMBER =        78
-
-ARCLEN =  3.46580367744253E+00
-NFE =  380
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99980032635326E-01
-
-X( 1) = (  8.76343727260696E-01,  4.96055837534466E-01)
-X( 2) = (  2.56812413665228E-01, -7.57196938199438E-02)
-X( 3) = ( -4.54602674291015E-01,  1.07105297595042E+00)
-X( 4) = (  1.02446083125801E+00, -4.04248106310829E-01)
-
-X( 5) = ( -3.78445849112882E-02,  4.48209354294725E-01)
-
-PATH NUMBER =        79
-
-ARCLEN =  4.01540823186210E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99955713908033E-01
-
-X( 1) = (  6.83016539432816E-01,  2.79935712404455E-01)
-X( 2) = ( -4.28146357134627E-01, -5.30968522896732E-01)
-X( 3) = (  5.87667169081623E-01,  5.03703224424180E-01)
-X( 4) = (  5.92799181386750E-01, -2.66994821620682E-01)
-
-X( 5) = ( -7.54757338200127E-01,  3.17523771344044E-01)
-
-PATH NUMBER =        80
-
-ARCLEN =  6.56558898269209E+00
-NFE =  458
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99378721898034E-01
-
-X( 1) = (  7.00581626326646E-01, -1.85184262775772E-01)
-X( 2) = ( -5.08196272174495E-01, -1.78718988621809E-01)
-X( 3) = (  8.35708137124365E-01,  1.41137473206932E-01)
-X( 4) = ( -9.19981094457992E-01, -2.36944605668576E-01)
-
-X( 5) = ( -6.98426610867704E-01,  2.29525117961698E-01)
-
-PATH NUMBER =        81
-
-ARCLEN =  7.94154622017923E+00
-NFE =  493
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999929E-01
-
-X( 1) = (  7.45203176041989E+01,  2.74409051731727E+02)
-X( 2) = (  6.20765098521243E+02,  2.02596077485433E+02)
-X( 3) = (  2.09877981424849E-02,  4.22380063882654E-02)
-X( 4) = (  1.01987029447208E+00,  4.05684485380374E-02)
-
-X( 5) = ( -4.90016431657974E-04,  7.12606663312165E-04)
-
-PATH NUMBER =        82
-
-ARCLEN =  2.47977078669644E+00
-NFE =  591
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98655526434566E-01
-
-X( 1) = (  8.88534120109755E-01,  4.08559259426853E-02)
-X( 2) = (  3.99372770242050E-01, -2.99904592387969E-01)
-X( 3) = ( -5.09113190353030E-01,  2.02058279545465E-01)
-X( 4) = ( -6.26062586982930E-02, -4.63576954085029E-01)
-
-X( 5) = ( -3.60204424298086E-01,  9.10382809323810E-01)
-
-PATH NUMBER =        83
-
-ARCLEN =  1.72895727869802E+00
-NFE =  379
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99610525574853E-01
-
-X( 1) = (  5.66659863923061E-01,  2.31269606418320E-01)
-X( 2) = (  5.08031726839770E-01, -8.82946049223771E-01)
-X( 3) = ( -2.78679416341645E-01,  1.13657584485388E+00)
-X( 4) = (  5.62885696175210E-01, -5.75854454170476E-01)
-
-X( 5) = ( -1.84403588674769E-01,  4.56539194111714E-01)
-
-PATH NUMBER =        84
-
-ARCLEN =  1.57893871989838E+00
-NFE =  380
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999304702917E-01
-
-X( 1) = (  2.53874276581458E+00,  3.22939136192888E-02)
-X( 2) = (  1.35850181188611E-01,  2.16733117364594E-01)
-X( 3) = (  9.51745276807214E-01,  1.26570884481394E-01)
-X( 4) = (  1.31656307585193E-01, -5.68355268031577E-01)
-
-X( 5) = ( -2.69572833908085E-01,  1.31166600244876E-03)
-
-PATH NUMBER =        85
-
-ARCLEN =  1.65534463318557E+00
-NFE =  479
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998769389736E-01
-
-X( 1) = (  1.90979131629025E+00, -4.13653025128603E-01)
-X( 2) = (  4.14125492511020E-01,  4.35997978548817E-01)
-X( 3) = (  9.56496270855590E-01,  9.41113400838217E-02)
-X( 4) = ( -2.88694127267643E-02, -6.67807576893807E-02)
-
-X( 5) = ( -3.24844255303342E-01,  1.26012475658605E-02)
-
-PATH NUMBER =        86
-
-ARCLEN =  2.93298735929887E+00
-NFE =  211
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32909413844133E-08
-
-X( 1) = ( -2.43664014757167E+06, -8.91992231050618E+05)
-X( 2) = (  5.05492742991431E-01,  2.95022235973001E-01)
-X( 3) = ( -1.89264003454502E+07,  6.39561332103241E+05)
-X( 4) = ( -8.03150528231277E+06,  6.11216495179620E+06)
-
-X( 5) = (  3.99021234137760E-08,  8.29643684595359E-09)
-
-PATH NUMBER =        87
-
-ARCLEN =  1.42307524725123E+01
-NFE =  272
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999936E-01
-
-X( 1) = ( -3.08732930233587E-01, -1.50453510919391E+00)
-X( 2) = ( -2.74114289959122E+01, -1.46038417227258E+02)
-X( 3) = (  8.54530433099298E-01,  2.48733134491034E-02)
-X( 4) = ( -2.25604980433605E-02,  1.38934828846950E-01)
-
-X( 5) = ( -2.74676796867256E-03, -5.00562468708710E-03)
-
-PATH NUMBER =        88
-
-ARCLEN =  7.99751334644396E+00
-NFE =  306
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.81785603915268E-01
-
-X( 1) = (  6.03185904995551E-01, -3.02013555481388E-01)
-X( 2) = (  1.04948631632316E+00,  1.61526991530366E+00)
-X( 3) = ( -1.68620945766175E-01, -1.75976136248654E+00)
-X( 4) = (  3.78677137824260E-01,  4.77990655910851E-01)
-
-X( 5) = (  1.65304486707293E+00, -1.67493264487962E+00)
-
-PATH NUMBER =        89
-
-ARCLEN =  6.29851099203361E+00
-NFE =  216
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.48681376098022E-13
-
-X( 1) = (  4.96992598972681E-01, -4.26893212051462E-03)
-X( 2) = (  4.34676380175866E+12,  5.05864450260649E+12)
-X( 3) = ( -1.24166146744313E+12, -5.84894754392862E+12)
-X( 4) = (  1.65987312921826E+12,  2.61589805465203E+12)
-
-X( 5) = (  2.58795914385990E-13, -4.40227498552104E-13)
-
-PATH NUMBER =        90
-
-ARCLEN =  4.65010713487824E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999920E-01
-
-X( 1) = (  8.88996189303631E-01,  7.42457930616810E-04)
-X( 2) = ( -3.24325461520136E-01, -2.10658372394391E-03)
-X( 3) = ( -1.23810717874458E+00,  9.50935183943204E+01)
-X( 4) = (  8.36307359551980E+01, -1.16115480201590E+02)
-
-X( 5) = (  3.97172903918499E-03,  5.84074888353936E-03)
-
-PATH NUMBER =        91
-
-ARCLEN =  1.41572338339002E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94540629670554E-01
-
-X( 1) = (  8.11491994843774E-01,  9.54156076903194E-02)
-X( 2) = (  7.29551334171785E-01, -4.28964955178330E-01)
-X( 3) = ( -3.28815497214951E-01,  1.21962847914816E-01)
-X( 4) = ( -3.75403505388025E-01, -5.03932740213027E-01)
-
-X( 5) = ( -3.91638646778194E-01,  4.84539506982877E-01)
-
-PATH NUMBER =        92
-
-ARCLEN =  2.11867384704063E+00
-NFE =  311
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999980380E-01
-
-X( 1) = ( -6.86075294731417E+00,  3.02606043828266E+01)
-X( 2) = (  4.84796157864554E-01, -4.91247204718427E-01)
-X( 3) = (  4.96952157776719E-01,  1.93673729962641E-01)
-X( 4) = (  1.69259522400765E+01, -1.16282606206639E+01)
-
-X( 5) = (  1.11847452041373E-03,  2.69778810232044E-02)
-
-PATH NUMBER =        93
-
-ARCLEN =  1.76685288637962E+00
-NFE =  227
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999973E-01
-
-X( 1) = (  6.73179616738419E+01,  8.55893242803046E+01)
-X( 2) = (  9.87948911095125E-02,  1.13431039741333E-02)
-X( 3) = (  9.54897776926761E-01, -3.90084379514509E-03)
-X( 4) = (  1.99069307403029E+01, -2.81744455039525E+01)
-
-X( 5) = ( -6.49651511518661E-03,  3.92719660570707E-03)
-
-PATH NUMBER =        94
-
-ARCLEN =  1.91867541269748E+00
-NFE =  319
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999959E-01
-
-X( 1) = ( -6.77848402087562E+01,  1.00837455922119E+02)
-X( 2) = ( -2.59362734089895E-02,  1.75765113037425E-01)
-X( 3) = (  1.00324025676741E+00,  2.20298430561171E-02)
-X( 4) = (  3.97312347572015E+01,  9.44525729449670E+00)
-
-X( 5) = (  1.60734950159741E-03,  6.66989913980479E-03)
-
-PATH NUMBER =        95
-
-ARCLEN =  1.81588990055113E+00
-NFE =  160
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.40116922065792E-10
-
-X( 1) = (  2.38105078087001E+08, -1.31344077603596E+08)
-X( 2) = (  4.94331161296098E-01,  2.67325123200987E-01)
-X( 3) = (  2.85352401240783E+08, -1.20605613030985E+08)
-X( 4) = (  1.26570816102669E+08,  1.11447129408004E+08)
-
-X( 5) = ( -8.59946247349329E-10, -7.83840329882796E-10)
-
-PATH NUMBER =        96
-
-ARCLEN =  1.72965126331475E+01
-NFE =  419
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98915943394809E-01
-
-X( 1) = ( -6.44569128229490E-01,  1.30643788578947E+00)
-X( 2) = ( -3.10091269643094E+00, -1.35726087240591E+00)
-X( 3) = (  8.66789671868696E-01, -7.52043779297464E-03)
-X( 4) = ( -8.20910881155244E-01,  2.49946273303854E-01)
-
-X( 5) = (  1.07671806410358E+00, -4.92967687155194E-01)
-
-PATH NUMBER =        97
-
-ARCLEN =  2.15872001424188E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999549725E-01
-
-X( 1) = (  7.76080837665619E+00,  1.12790816208892E+01)
-X( 2) = (  5.08500736803194E-01, -4.98978136170209E-01)
-X( 3) = (  4.85708031504090E-01,  1.78150128948534E-01)
-X( 4) = ( -1.83063204773161E-01, -5.76848438047530E+00)
-
-X( 5) = ( -3.95367651820810E-02,  3.53225142758536E-02)
-
-PATH NUMBER =        98
-
-ARCLEN =  6.65255795977724E+00
-NFE =  430
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.06641230788475E-06
-
-X( 1) = (  8.29142123953520E-01, -5.12539599773108E-02)
-X( 2) = ( -4.76351735648557E-01, -1.50919978028037E-01)
-X( 3) = (  2.55225110055159E+05, -4.83799210586545E+05)
-X( 4) = (  1.60421341227539E+05, -3.08652223451799E+05)
-
-X( 5) = ( -2.30105753091142E-07, -1.42862936257295E-06)
-
-PATH NUMBER =        99
-
-ARCLEN =  5.70287898526718E+00
-NFE =  289
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.62313638470469E-11
-
-X( 1) = (  6.56321953949099E-01,  1.08848285094210E-01)
-X( 2) = ( -5.48992516720773E+10,  1.95480806117870E+11)
-X( 3) = (  1.86925500018261E+11,  5.89331703867873E+10)
-X( 4) = ( -1.95689232681060E+11, -1.44498096860010E+11)
-
-X( 5) = ( -3.20419417994960E-13,  2.84049606752435E-12)
-
-PATH NUMBER =       100
-
-ARCLEN =  1.39235542198959E+00
-NFE =  349
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96477676176912E-01
-
-X( 1) = (  7.16829195745485E-01,  2.74713060715324E-01)
-X( 2) = (  8.05371362171607E-01, -1.32883661095283E-01)
-X( 3) = ( -7.01395193458350E-02, -3.83476825479534E-02)
-X( 4) = ( -3.22953274955697E-01, -7.65846335973935E-01)
-
-X( 5) = ( -2.70131749451103E-01,  4.36270736822751E-01)
-
-PATH NUMBER =       101
-
-ARCLEN =  1.07435322630370E+00
-NFE =  341
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98462880477183E-01
-
-X( 1) = (  5.37594633508620E-01,  9.07872545182551E-01)
-X( 2) = (  6.10775402671289E-01, -5.21369937757693E-01)
-X( 3) = (  4.78393639084031E-01,  3.70338862959876E-01)
-X( 4) = ( -1.08446859700849E-01, -1.17541842792501E+00)
-
-X( 5) = ( -1.81238812425984E-01,  2.63844060343223E-01)
-
-PATH NUMBER =       102
-
-ARCLEN =  1.77606691038846E+00
-NFE =  376
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.41244141828390E-06
-
-X( 1) = (  3.23384722283896E+05,  4.30490152892249E+05)
-X( 2) = (  5.41198796272485E-02, -1.42410310103430E-01)
-X( 3) = (  8.61509400196559E-01,  3.57099683190069E-02)
-X( 4) = ( -2.69062733410798E+04, -2.36410717814058E+05)
-
-X( 5) = ( -1.11829983085268E-06,  9.34223927387065E-07)
-
-PATH NUMBER =       103
-
-ARCLEN =  1.89165528029106E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998682340854E-01
-
-X( 1) = (  1.48140072306355E+00,  1.02593434866637E+00)
-X( 2) = (  4.46447430600544E-01,  5.55556694121923E-01)
-X( 3) = (  4.84258993468869E-01, -1.47139615050245E-01)
-X( 4) = ( -3.00537987211993E+00, -1.62762210625237E+00)
-
-X( 5) = ( -1.13388828761227E-01,  1.76450377793016E-01)
-
-PATH NUMBER =       104
-
-ARCLEN =  1.40759513280517E+00
-NFE =  360
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99953343710522E-01
-
-X( 1) = (  1.05820128298764E+00,  4.89193598729678E-01)
-X( 2) = (  1.20109140718965E-01, -1.29810637506714E-02)
-X( 3) = (  9.38955054205349E-01, -2.57190858079685E-03)
-X( 4) = ( -8.31956033499184E-01,  6.16088630506132E-01)
-
-X( 5) = ( -2.77983361662235E-01,  1.08101658821756E-01)
-
-PATH NUMBER =       105
-
-ARCLEN =  2.22394571301437E+00
-NFE =  281
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.11190880627439E-06
-
-X( 1) = (  4.75437143353766E+05,  4.51661786986928E+05)
-X( 2) = (  4.29866624940591E-01, -1.04240122950017E-01)
-X( 3) = (  4.05603318056693E-01,  1.35545466875330E+00)
-X( 4) = ( -7.28709207218385E+04, -2.84701501926513E+05)
-
-X( 5) = ( -1.03924393023933E-06,  6.09048645206888E-07)
-
-PATH NUMBER =       106
-
-ARCLEN =  2.66936220866708E+00
-NFE =  346
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.01619631832186E-05
-
-X( 1) = ( -1.45368618954504E+05,  1.16308321929900E+05)
-X( 2) = (  4.68506534761662E-01,  1.12707191286945E-01)
-X( 3) = (  7.59158458433557E-01, -9.30572221116715E-01)
-X( 4) = (  1.52480412186302E+05,  2.21558012409445E+04)
-
-X( 5) = (  3.57719614621068E-06,  3.38528654504676E-06)
-
-PATH NUMBER =       107
-
-ARCLEN =  2.12257614146339E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99791950580455E-01
-
-X( 1) = (  7.23051479131397E-01, -1.89866226650534E-02)
-X( 2) = (  6.52664900423531E-01,  5.50373132579539E-02)
-X( 3) = ( -5.03351124459091E-01,  2.72537513264614E-02)
-X( 4) = ( -1.37632043587420E+00, -3.76654190575998E-01)
-
-X( 5) = ( -1.26132042784284E-01,  4.89412871550007E-01)
-
-PATH NUMBER =       108
-
-ARCLEN =  2.88584108050533E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99769079946147E-01
-
-X( 1) = (  9.07709840814119E-01,  1.62319547775266E-01)
-X( 2) = ( -3.89331352587472E-01,  3.17242846608525E-01)
-X( 3) = (  6.69020307656114E-01, -7.77603806085353E-02)
-X( 4) = ( -1.42436062368582E+00,  4.54739802599003E-01)
-
-X( 5) = ( -4.14652538079096E-01,  2.56556987767930E-01)
-
-PATH NUMBER =       109
-
-ARCLEN =  1.31387409582502E+00
-NFE =  318
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96816206660007E-01
-
-X( 1) = (  3.65776918991747E-01,  2.99206433876032E-01)
-X( 2) = (  8.80176710205453E-01, -4.60358810711021E-02)
-X( 3) = ( -6.18824432687989E-02,  9.04820371436814E-02)
-X( 4) = ( -2.25274822745700E-01, -9.21442112593395E-01)
-
-X( 5) = ( -1.01648239288099E-01,  4.34324654764941E-01)
-
-PATH NUMBER =       110
-
-ARCLEN =  2.05162215881364E+00
-NFE =  467
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99715499908950E-01
-
-X( 1) = (  5.66006015967985E-01,  2.34723488338424E-01)
-X( 2) = (  4.84918394536943E-01, -8.73683701138118E-01)
-X( 3) = ( -2.56602830590181E-01,  1.14554909324377E+00)
-X( 4) = (  5.89182598945682E-01, -5.87596912974046E-01)
-
-X( 5) = ( -1.83496141028413E-01,  4.58852567734240E-01)
-
-PATH NUMBER =       111
-
-ARCLEN =  1.44062334699679E+00
-NFE =  226
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.34470915530451E-09
-
-X( 1) = (  4.44689284436185E+09,  4.13559942313881E+09)
-X( 2) = (  5.38503240233244E-01,  1.48217168698382E-01)
-X( 3) = (  5.41719575761235E+09, -1.54277829507286E+09)
-X( 4) = ( -4.70366523912293E+09, -5.88018019426889E+09)
-
-X( 5) = ( -6.77542070029197E-11,  2.21544679303298E-11)
-
-PATH NUMBER =       112
-
-ARCLEN =  1.28664339058043E+00
-NFE =  138
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.47255736484621E-12
-
-X( 1) = (  6.12540208955110E+07,  3.12826810461344E+10)
-X( 2) = (  4.99416087022520E-01,  2.88584766196890E-01)
-X( 3) = (  2.93901129260047E+10,  1.24379124546453E+10)
-X( 4) = ( -2.59965647960958E+09, -2.62191612801577E+10)
-
-X( 5) = ( -7.53910779291433E-12,  1.04835071830164E-11)
-
-PATH NUMBER =       113
-
-ARCLEN =  1.26134668435397E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98159952844691E-01
-
-X( 1) = ( -1.46939150202446E-03,  1.38674918483458E+00)
-X( 2) = (  3.85370379595453E-02,  1.44291455514218E-01)
-X( 3) = (  1.00336578862556E+00, -1.24377053138807E-03)
-X( 4) = ( -4.63706221317646E-01, -2.12823425831943E-01)
-
-X( 5) = ( -1.37858091121370E-01,  2.54582048578096E-01)
-
-PATH NUMBER =       114
-
-ARCLEN =  2.93611013613367E+00
-NFE =  384
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999982E-01
-
-X( 1) = (  9.88943443920504E+01,  6.17751570966029E+01)
-X( 2) = (  4.68269554176154E-01, -9.47275149744717E-02)
-X( 3) = (  6.80378603772762E-01,  8.82701495945903E-01)
-X( 4) = ( -1.68609886036477E+02, -1.34145313333001E+02)
-
-X( 5) = ( -3.27838242855710E-03,  3.71814705600779E-03)
-
-PATH NUMBER =       115
-
-ARCLEN =  2.06545820001365E+00
-NFE =  241
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.86006526800009E-08
-
-X( 1) = ( -1.36698484406493E+06,  5.43288651356689E+06)
-X( 2) = (  8.98743345934022E-02,  2.15353591429390E-01)
-X( 3) = (  8.65953534446926E-01, -6.63092585560910E-02)
-X( 4) = (  1.18053763939940E+06, -4.93622517695521E+06)
-
-X( 5) = (  2.32097317710497E-08,  1.15985167341932E-07)
-
-PATH NUMBER =       116
-
-ARCLEN =  2.56614226718687E+00
-NFE =  462
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999942736426E-01
-
-X( 1) = ( -9.63924751979608E-02,  9.27024735420653E-02)
-X( 2) = (  8.13757801081886E-01,  3.73364612948669E-02)
-X( 3) = (  4.55071418463323E-01,  4.71889643201810E-01)
-X( 4) = ( -3.21247587337368E+00, -1.69230476897735E+00)
-
-X( 5) = ( -3.91119739859893E-02,  2.15239890274863E-01)
-
-PATH NUMBER =       117
-
-ARCLEN =  2.75163860530342E+00
-NFE =  272
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.33451702886244E-06
-
-X( 1) = (  4.27260405944481E+06, -4.82628713127768E+06)
-X( 2) = (  4.06922941610254E+00, -4.26215986560677E-01)
-X( 3) = (  5.73689760403251E-01,  4.09557264386815E-02)
-X( 4) = ( -8.47836780546048E+06,  2.86954533435076E+06)
-
-X( 5) = ( -1.01210979881153E-07, -7.28340221258796E-08)
-
-PATH NUMBER =       118
-
-ARCLEN =  2.20773407583488E+00
-NFE =  311
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.40905545152163E-09
-
-X( 1) = ( -5.14621750522559E+07,  2.63112643768849E+06)
-X( 2) = (  4.95072076500896E-01,  2.90766291608293E-01)
-X( 3) = ( -1.16049218276046E+08,  8.31484157949273E+07)
-X( 4) = (  2.45175660053248E+08, -3.86877770092631E+07)
-
-X( 5) = (  3.25741182858057E-09,  3.52187721369170E-10)
-
-PATH NUMBER =       119
-
-ARCLEN =  1.66424236067250E+00
-NFE =  366
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98564862695666E-01
-
-X( 1) = (  6.99531912241106E-01,  2.19424790549742E-01)
-X( 2) = (  7.31932606474501E-01, -5.98676736184411E-02)
-X( 3) = ( -3.03977814627601E-01,  2.55430024248689E-01)
-X( 4) = (  1.03702640034597E-01, -3.91563839288570E-01)
-
-X( 5) = ( -1.93711303579393E-01,  5.16580598828712E-01)
-
-PATH NUMBER =       120
-
-ARCLEN =  1.82034308064933E+00
-NFE =  258
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.14340129764298E-07
-
-X( 1) = ( -4.43924214780967E+06, -5.78490406877299E+06)
-X( 2) = (  4.36562420565498E-01, -7.97573124635563E-02)
-X( 3) = (  5.09997771527861E-01,  8.98984542506146E-01)
-X( 4) = (  4.23571673600234E+06,  5.45991497642960E+06)
-
-X( 5) = (  5.74003201965370E-08, -6.98932045247770E-08)
-
-PATH NUMBER =       121
-
-ARCLEN =  1.51890108316194E+00
-NFE =  278
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999355560485E-01
-
-X( 1) = (  2.82457616665750E+00,  7.44074807316739E-01)
-X( 2) = (  2.26006081685079E-01,  4.98089874532246E-01)
-X( 3) = (  1.02545224742151E+00, -1.86400576088823E-02)
-X( 4) = (  8.07603694818933E-03, -7.05010030943321E-02)
-
-X( 5) = ( -2.05645600966201E-01,  3.50394233327193E-02)
-
-PATH NUMBER =       122
-
-ARCLEN =  1.85150969901151E+00
-NFE =  224
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.95213381885057E-09
-
-X( 1) = ( -8.11549487301158E+08,  2.98417768511622E+08)
-X( 2) = (  5.01189082287507E-01,  2.98467818249397E-01)
-X( 3) = ( -2.54258918726739E+08,  7.42033595156891E+08)
-X( 4) = (  1.36259955887126E+09, -2.33608718576972E+08)
-
-X( 5) = (  3.98060248418862E-10,  2.88693048308176E-10)
-
-PATH NUMBER =       123
-
-ARCLEN =  3.02747737446140E+00
-NFE =  305
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999981E-01
-
-X( 1) = ( -1.25748609516545E+02,  1.75555365824231E+01)
-X( 2) = (  1.23934126474148E-01,  1.81371202252546E-01)
-X( 3) = (  8.96726629439054E-01, -3.81579005004339E-02)
-X( 4) = (  2.35989610523302E+02, -8.34485553911812E+00)
-
-X( 5) = (  4.54458739908491E-03, -6.51828838293843E-04)
-
-PATH NUMBER =       124
-
-ARCLEN =  5.09005509019909E+00
-NFE =  273
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.85193130992869E-01
-
-X( 1) = (  5.26909127141490E-01, -2.14798874207313E-01)
-X( 2) = (  1.44680466631422E+00,  1.21727041225744E+00)
-X( 3) = ( -1.06841612817003E+00, -1.58338011688140E+00)
-X( 4) = (  3.89220769544047E-01,  3.53211946522353E-01)
-
-X( 5) = (  1.00732439214130E+00,  1.19257202561858E-01)
-
-PATH NUMBER =       125
-
-ARCLEN =  3.03963362657041E+00
-NFE =  324
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.64888252696728E-08
-
-X( 1) = (  6.96285538139947E+05, -3.75465737067224E+07)
-X( 2) = (  1.03686191910658E+00,  6.12953452592710E-02)
-X( 3) = ( -4.20264575926135E+07,  3.95653732866405E+07)
-X( 4) = ( -1.67928314507382E-01, -9.24196021839767E-02)
-
-X( 5) = (  1.31374680519577E-08,  1.63839280982242E-09)
-
-PATH NUMBER =       126
-
-ARCLEN =  1.81875589777444E+00
-NFE =  210
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.94306638239819E-09
-
-X( 1) = (  4.80648652079842E+08,  1.23594268861949E+09)
-X( 2) = (  5.06979472319759E-01,  1.60940255837363E-01)
-X( 3) = (  1.14421392475094E+09,  7.31948382088718E+08)
-X( 4) = ( -8.56969861613402E+08, -2.99887863754403E+09)
-
-X( 5) = ( -1.06066371099523E-10,  2.40566160253971E-10)
-
-PATH NUMBER =       127
-
-ARCLEN =  2.09038684177420E+00
-NFE =  480
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999313292164E-01
-
-X( 1) = (  4.49628012334844E-01,  1.90302040148105E-01)
-X( 2) = (  4.93553628006254E-01, -4.86035488548805E-01)
-X( 3) = (  2.96116036772964E+00,  1.53192164873827E+00)
-X( 4) = ( -1.79587559075139E+00, -3.96544335849597E+00)
-
-X( 5) = ( -1.01200341878717E-01,  1.34609797033455E-01)
-
-PATH NUMBER =       128
-
-ARCLEN =  1.67387456734941E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994032983528E-01
-
-X( 1) = ( -5.81264148581136E-01,  1.53479200418337E+00)
-X( 2) = (  4.42421680576517E-01, -8.53824446120058E-02)
-X( 3) = (  9.02204515046089E-01,  7.80572779808917E-01)
-X( 4) = (  2.14837924824703E+00, -2.49304198496026E+00)
-
-X( 5) = (  3.01133766315593E-02,  2.50455696373815E-01)
-
-PATH NUMBER =       129
-
-ARCLEN =  1.46608054509744E+00
-NFE =  181
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.40635366050399E-11
-
-X( 1) = ( -1.30595538214124E+09,  7.74724969924552E+09)
-X( 2) = (  4.96303036482794E-01,  2.74736256788969E-01)
-X( 3) = (  7.49067756362415E+09,  5.54125344482537E+09)
-X( 4) = (  2.60854655424585E+09, -9.20400581123660E+09)
-
-X( 5) = ( -1.88458553775604E-11,  4.58667937614995E-11)
-
-PATH NUMBER =       130
-
-ARCLEN =  1.85760536777883E+00
-NFE =  241
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999888E-01
-
-X( 1) = (  2.92660895188229E+02, -2.13687035015816E+01)
-X( 2) = (  1.54659105504731E+03, -1.24073107389302E+03)
-X( 3) = (  5.18190130877970E-01,  7.50765739922560E-02)
-X( 4) = (  2.82051688355733E-01,  3.27033202103947E+00)
-
-X( 5) = ( -3.70907878260012E-04, -2.10743834919805E-05)
-
-PATH NUMBER =       131
-
-ARCLEN =  2.67576239648713E+00
-NFE =  386
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98114558555973E-01
-
-X( 1) = (  7.02115467750390E-01, -7.28324488404387E-01)
-X( 2) = (  1.03365269187255E+00,  1.29343855215031E-01)
-X( 3) = (  3.39888540248627E-02, -7.66842825917020E-01)
-X( 4) = ( -1.81482461359257E-01,  9.67012862657805E-04)
-
-X( 5) = ( -8.54239191853296E-01, -4.37695385980045E-01)
-
-PATH NUMBER =       132
-
-ARCLEN =  1.53006340415999E+00
-NFE =  215
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.20911392906056E-11
-
-X( 1) = (  2.08152207609084E+10,  5.24150482649782E+09)
-X( 2) = (  5.16563879470598E-01,  2.98247154167186E-01)
-X( 3) = (  2.32407820487057E+10, -2.33250198534713E+10)
-X( 4) = ( -2.94369251259206E+10, -1.47983479222668E+10)
-
-X( 5) = ( -1.53085530092256E-11, -4.82634722118180E-12)
-
-PATH NUMBER =       133
-
-ARCLEN =  2.27298062348132E+00
-NFE =  253
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.62560284341428E-07
-
-X( 1) = ( -1.11855667607293E+06,  2.75607957057485E+06)
-X( 2) = (  4.84122027128681E-01,  1.12450508201802E-01)
-X( 3) = (  4.14489431170645E+06, -1.60138072536099E+06)
-X( 4) = (  6.13025548948818E-01, -9.55466294356853E-01)
-
-X( 5) = ( -1.62374990670761E-07,  4.62313305720136E-08)
-
-PATH NUMBER =       134
-
-ARCLEN =  2.38933979672098E+00
-NFE =  261
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.51098358119467E-06
-
-X( 1) = ( -1.33218586393997E+05, -2.22948343429745E+05)
-X( 2) = (  5.04714948310031E-01,  1.22836159399177E-01)
-X( 3) = ( -5.66772236794473E+04,  7.83434593956979E+04)
-X( 4) = (  4.32639287566464E-01, -1.24548317990790E+00)
-
-X( 5) = (  2.57145797885646E-06, -6.74514058906161E-07)
-
-PATH NUMBER =       135
-
-ARCLEN =  2.48419519213939E+00
-NFE =  297
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999948E-01
-
-X( 1) = (  2.23146305355286E-02,  1.72429259905799E-02)
-X( 2) = (  1.11375195593868E+00, -1.37126604961837E-02)
-X( 3) = ( -8.96584007547869E+01,  7.30284435535188E+01)
-X( 4) = (  1.60780748359220E+02, -3.90233967665067E+01)
-
-X( 5) = (  5.34008261596053E-03,  9.48628963504727E-04)
-
-PATH NUMBER =       136
-
-ARCLEN =  2.83165958947535E+00
-NFE =  368
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995374603968E-01
-
-X( 1) = (  8.34256449520585E-01, -1.06025094374713E-03)
-X( 2) = ( -5.32258360285515E-02,  4.21709342333757E-02)
-X( 3) = ( -8.07506105295878E-01,  1.46325554738033E+00)
-X( 4) = (  1.71297750920540E+00, -8.71705221604661E-01)
-
-X( 5) = (  2.68286042928050E-01,  3.45224631682006E-01)
-
-PATH NUMBER =       137
-
-ARCLEN =  1.29296844937191E+00
-NFE =  363
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97361852855591E-01
-
-X( 1) = ( -2.08786724673703E-02, -1.01758655484184E-02)
-X( 2) = (  8.17162953512441E-01,  8.22858289542763E-03)
-X( 3) = ( -1.58494018485683E-01,  7.02162905764510E-01)
-X( 4) = (  8.85045791349319E-01, -5.38738723550158E-01)
-
-X( 5) = (  8.90421292366610E-02,  4.45518842194061E-01)
-
-PATH NUMBER =       138
-
-ARCLEN =  1.44365680025706E+00
-NFE =  170
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.09227361116454E-10
-
-X( 1) = ( -6.01121617892365E+09, -2.45696326576858E+09)
-X( 2) = (  5.57519557269276E-01,  2.97880407280370E-01)
-X( 3) = ( -1.38905132185275E+10,  5.07274171776991E+09)
-X( 4) = (  8.16070865878874E+09,  1.15514587444723E+10)
-
-X( 5) = (  4.22577328760675E-11,  1.14210133321177E-12)
-
-PATH NUMBER =       139
-
-ARCLEN =  1.83648632449583E+00
-NFE =  356
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.79075799637233E-01
-
-X( 1) = ( -5.99141605118644E-01,  4.97647404185997E-01)
-X( 2) = ( -1.07730763359983E+00,  3.77146294177883E-01)
-X( 3) = (  8.24729772626000E-01,  5.76453793329292E-02)
-X( 4) = (  6.94694849640420E-01, -1.62138686377170E-01)
-
-X( 5) = (  4.52817450591934E-01,  3.74971550959953E-01)
-
-PATH NUMBER =       140
-
-ARCLEN =  1.76114470031387E+00
-NFE =  390
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97907332590616E-01
-
-X( 1) = (  9.00633822493474E-01,  1.90575978287968E-01)
-X( 2) = (  1.56522865550784E-01,  8.34069058554824E-01)
-X( 3) = (  8.78572377271986E-01, -4.01067118223569E-01)
-X( 4) = ( -2.00064177617420E-01, -3.42144744872437E-01)
-
-X( 5) = ( -4.44346678249445E-01,  3.56878043892269E-01)
-
-PATH NUMBER =       141
-
-ARCLEN =  2.08229904668382E+00
-NFE =  470
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99647886058041E-01
-
-X( 1) = ( -8.17511087639777E-01,  1.30036617406966E+00)
-X( 2) = ( -1.99207456981843E+00,  2.25027400105304E+00)
-X( 3) = (  6.55527938114582E-01,  3.18579157120944E-01)
-X( 4) = (  5.69420523286979E-01, -1.31251423914276E-01)
-
-X( 5) = (  1.36838506358445E-01,  1.41358626049993E-01)
-
-PATH NUMBER =       142
-
-ARCLEN =  4.77485738783065E+00
-NFE =  473
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99794294202570E-01
-
-X( 1) = ( -7.01955923959428E-01, -3.61974451183133E-02)
-X( 2) = ( -7.54475550634808E-01, -3.42991032014799E+00)
-X( 3) = ( -1.19828692891804E+00,  2.64189082707401E+00)
-X( 4) = (  8.74207354848687E-01,  2.89166679033899E-03)
-
-X( 5) = (  5.85040406725883E-01,  4.06601241612840E-01)
-
-PATH NUMBER =       143
-
-ARCLEN =  4.08479710356761E+00
-NFE =  327
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93074658194240E-01
-
-X( 1) = (  1.56997524149869E-02, -3.55488741905786E-02)
-X( 2) = (  8.34108781518533E-01,  3.10621585014065E-01)
-X( 3) = ( -9.46350732599615E-01, -4.94487571660811E-01)
-X( 4) = (  8.50156428513274E-01,  8.74353271587719E-02)
-
-X( 5) = (  5.79512321227017E-01,  2.66327587256352E-01)
-
-PATH NUMBER =       144
-
-ARCLEN =  2.20345294431710E+00
-NFE =  208
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999944967E-01
-
-X( 1) = (  1.98523157528494E+01,  3.37608639509582E+00)
-X( 2) = (  4.81712139373055E-01, -2.87734429424461E-01)
-X( 3) = ( -1.27419246047094E+02,  5.14633986624395E+01)
-X( 4) = (  1.79804208474353E+02, -7.72211768813308E+00)
-
-X( 5) = (  5.02871366328489E-03, -5.34783404937987E-04)
-
-PATH NUMBER =       145
-
-ARCLEN =  1.62012441054187E+00
-NFE =  258
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996644021732E-01
-
-X( 1) = (  4.88024859112670E-01,  1.97086143861614E-01)
-X( 2) = (  4.44038705633529E-01, -4.88223759291480E-01)
-X( 3) = ( -1.13473744737808E+00,  2.56021961657099E+00)
-X( 4) = (  2.39594359534201E+00, -1.28326348470332E+00)
-
-X( 5) = (  1.15454169337716E-01,  2.36965465143466E-01)
-
-PATH NUMBER =       146
-
-ARCLEN =  1.59548377173083E+00
-NFE =  370
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99747476515082E-01
-
-X( 1) = (  2.00838172552393E-01, -1.05923854111502E-03)
-X( 2) = (  5.98964228533948E-01,  3.26034120602148E-01)
-X( 3) = ( -7.08474654778333E-01,  8.51222892342893E-01)
-X( 4) = (  1.27146029209684E+00, -8.18159968828631E-02)
-
-X( 5) = (  2.06680274223229E-01,  3.62580225516792E-01)
-
-PATH NUMBER =       147
-
-ARCLEN =  2.24456095856443E+00
-NFE =  324
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99479729745557E-01
-
-X( 1) = (  3.42287625173392E-01,  4.99378780800215E-01)
-X( 2) = ( -5.45340207875455E-01,  4.21149055379630E-01)
-X( 3) = (  2.67112135428283E-01,  2.44850388540643E-01)
-X( 4) = (  7.76511333798090E-01, -1.16176671460596E-01)
-
-X( 5) = (  2.47716566817324E-01,  7.21438145827318E-01)
-
-PATH NUMBER =       148
-
-ARCLEN =  2.17181710847208E+00
-NFE =  416
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999337139350E-01
-
-X( 1) = (  7.16986365540105E-01,  2.77683985304514E-01)
-X( 2) = ( -4.21270045204556E-01,  5.19637973621866E-02)
-X( 3) = ( -1.00836384261332E+00,  1.88449292003940E+00)
-X( 4) = (  8.26497998066190E-01, -1.07526145228333E-01)
-
-X( 5) = (  1.37843613307004E-01,  2.89947300376086E-01)
-
-PATH NUMBER =       149
-
-ARCLEN =  1.44998484878315E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97255908885343E-01
-
-X( 1) = ( -5.56840921146870E-02,  5.83137947726461E-01)
-X( 2) = ( -3.67565070201352E-01,  1.33294315507929E+00)
-X( 3) = (  3.37845830077737E-01,  9.23860100100594E-01)
-X( 4) = (  8.01611475155474E-01, -6.68045092804226E-02)
-
-X( 5) = (  9.36165940711369E-02,  2.58164572430672E-01)
-
-PATH NUMBER =       150
-
-ARCLEN =  6.80869676181110E+00
-NFE =  406
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999980E-01
-
-X( 1) = ( -1.75565124413353E-01, -2.96215667974567E-03)
-X( 2) = ( -1.27735278501280E+03, -1.60214046552179E+02)
-X( 3) = (  2.45726311198908E+02, -2.06501168432296E+02)
-X( 4) = (  8.92350944432162E-01,  7.12226767285739E-05)
-
-X( 5) = (  2.88642453301909E-04, -5.66860249345463E-04)
-
-PATH NUMBER =       151
-
-ARCLEN =  1.00554529614011E+01
-NFE =  395
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.55990414078717E-09
-
-X( 1) = ( -1.51586528884165E+00, -2.50415426380882E-02)
-X( 2) = ( -8.30345032373440E+07, -2.28542234438399E+07)
-X( 3) = (  4.49550944133431E+07, -1.56643141727509E+07)
-X( 4) = (  6.32356283378300E-01, -4.88470791865087E-04)
-
-X( 5) = ( -2.23271516428198E-10, -9.31240606128576E-09)
-
-PATH NUMBER =       152
-
-ARCLEN =  3.14839956362421E+00
-NFE =  452
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.35528601800253E-06
-
-X( 1) = (  8.57855077267063E-01, -2.04095175665029E-01)
-X( 2) = ( -1.93072121799837E-01,  7.09865679841912E-03)
-X( 3) = (  2.23200376754395E+05, -4.18806507349720E+04)
-X( 4) = (  9.35361662408063E-01,  1.77336276127157E-01)
-
-X( 5) = ( -3.12332266127284E-06, -7.42164559089961E-07)
-
-PATH NUMBER =       153
-
-ARCLEN =  3.41163052282706E+00
-NFE =  210
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.10054905230986E-08
-
-X( 1) = (  6.24733221278597E-01, -1.21407307640246E-02)
-X( 2) = ( -2.50708385484876E+00, -2.95751671912626E+00)
-X( 3) = ( -1.51840332024781E+08,  3.47789250788831E+08)
-X( 4) = (  2.85541448207211E+08, -1.05246751412685E+08)
-
-X( 5) = (  1.36901298603649E-09,  1.55789991952877E-09)
-
-PATH NUMBER =       154
-
-ARCLEN =  4.48008194047956E+00
-NFE =  251
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.84008232785254E-08
-
-X( 1) = (  8.94862327211970E-01,  1.09687918835554E-02)
-X( 2) = ( -2.57528206718644E+07,  4.92742940323419E+07)
-X( 3) = (  3.20064704406193E+07,  3.01822990419923E+07)
-X( 4) = ( -1.33617458832146E-01,  4.98715305012329E-02)
-
-X( 5) = (  3.29416607820808E-09,  1.47612775168319E-08)
-
-PATH NUMBER =       155
-
-ARCLEN =  3.43811706039384E+00
-NFE =  252
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.13266017859391E-09
-
-X( 1) = (  9.93914405171446E+08, -1.16209458389772E+09)
-X( 2) = (  5.99642622712883E-01,  2.87247486770994E-01)
-X( 3) = (  1.09693466930850E+09,  3.90841304840479E+08)
-X( 4) = ( -5.37845605777913E+08, -1.23193190491432E+09)
-
-X( 5) = ( -4.63975544806204E-10, -2.66666239491595E-10)
-
-PATH NUMBER =       156
-
-ARCLEN =  1.61479459748645E+00
-NFE =  298
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99912668201517E-01
-
-X( 1) = (  8.84546944702385E-01,  3.55936783116049E-01)
-X( 2) = (  5.04699917996522E-02,  5.70191066022630E-01)
-X( 3) = (  5.87479673316489E-01,  5.70460171846123E-01)
-X( 4) = (  4.95443736888436E-01, -5.17011871435247E-01)
-
-X( 5) = ( -1.87034862527302E-01,  4.08718013761897E-01)
-
-PATH NUMBER =       157
-
-ARCLEN =  1.43983790238785E+00
-NFE =  340
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99963604268791E-01
-
-X( 1) = (  5.23070961879330E-01,  6.70563120622102E-01)
-X( 2) = ( -2.88325243760380E-01,  1.19323743251793E+00)
-X( 3) = (  1.03042163160989E+00,  8.51217286382163E-01)
-X( 4) = (  5.13470790485888E-01, -3.41028090220011E-02)
-
-X( 5) = ( -7.17912641785184E-02,  3.00802288245043E-01)
-
-PATH NUMBER =       158
-
-ARCLEN =  3.54122218952305E+00
-NFE =  233
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.31281656459972E-06
-
-X( 1) = (  2.12662888770297E+00, -2.36710339863748E-01)
-X( 2) = (  1.40264234117815E+00,  1.76817254209476E-01)
-X( 3) = ( -1.23004599772668E+06,  6.78150660257676E+05)
-X( 4) = ( -6.40658628314561E-02,  5.36353448046980E-03)
-
-X( 5) = (  4.42040804486357E-07,  2.72034330193636E-07)
-
-PATH NUMBER =       159
-
-ARCLEN =  3.10310735494724E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999827496100E-01
-
-X( 1) = (  7.24180284009754E-01, -9.26911784960449E-02)
-X( 2) = ( -7.22058585831103E-01, -2.52299531312494E-01)
-X( 3) = (  2.45161998430370E+00,  2.23126775627350E+00)
-X( 4) = (  5.24543746287435E-01,  1.06617151013885E-01)
-
-X( 5) = ( -2.08101474117129E-01,  1.35077866619721E-01)
-
-PATH NUMBER =       160
-
-ARCLEN =  6.74144838899877E+00
-NFE =  527
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995161725717E-01
-
-X( 1) = ( -5.22859030735894E-02,  1.46282852990707E-02)
-X( 2) = (  5.98296986335817E+00, -1.71520802858041E+00)
-X( 3) = ( -5.19511375068730E+00, -9.48491049008815E-01)
-X( 4) = (  9.04385056644714E-01,  1.13622736612144E-02)
-
-X( 5) = (  1.64353744767560E-01,  3.29554397578317E-01)
-
-PATH NUMBER =       161
-
-ARCLEN =  4.49881603362540E+00
-NFE =  206
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.60332450939958E-12
-
-X( 1) = ( -2.55478653949542E+11, -6.42341446027138E+10)
-X( 2) = ( -1.57776930770327E+11,  1.33923231935070E+10)
-X( 3) = (  2.90955093628488E+11,  2.82508839669435E+11)
-X( 4) = (  4.93474739069864E-01, -1.31493661469119E-03)
-
-X( 5) = (  8.21150276681532E-13,  2.86166397652984E-12)
-
-PATH NUMBER =       162
-
-ARCLEN =  4.83226884985110E+00
-NFE =  287
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.08184709308053E-06
-
-X( 1) = (  1.13634472708326E+00,  2.06471890894964E-02)
-X( 2) = ( -2.02059815446059E-01,  8.90188826615257E-02)
-X( 3) = ( -1.51255592398399E+05,  1.19260104071081E+06)
-X( 4) = (  8.77203747862759E-01,  1.13311212082830E-01)
-
-X( 5) = (  4.74620962840971E-08,  6.04587035849587E-07)
-
-PATH NUMBER =       163
-
-ARCLEN =  6.74367407557924E+00
-NFE =  340
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995931591818E-01
-
-X( 1) = (  8.65250008129842E-01,  1.23810943679407E-03)
-X( 2) = ( -2.10035073012948E+00, -1.74933083601008E+00)
-X( 3) = ( -2.02491717687417E+00,  1.95967286468983E+00)
-X( 4) = ( -4.27966754469582E-01,  6.44428560011573E-02)
-
-X( 5) = (  4.05507753437115E-01,  4.81190028243986E-02)
-
-PATH NUMBER =       164
-
-ARCLEN =  2.16039336517483E+00
-NFE =  352
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99870715429992E-01
-
-X( 1) = (  7.10150640943271E-01,  4.01467151114727E-01)
-X( 2) = (  3.51238482026978E-01, -3.61023459487847E-01)
-X( 3) = ( -8.26346014217882E-01,  4.64007772797913E-01)
-X( 4) = (  6.13998272696893E-01, -2.79941690602091E-01)
-
-X( 5) = (  7.66122607982986E-02,  7.16563363923279E-01)
-
-PATH NUMBER =       165
-
-ARCLEN =  4.11140772480729E+00
-NFE =  311
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.74708942460526E-07
-
-X( 1) = ( -1.39485390971185E+07, -6.32250435243609E+06)
-X( 2) = (  5.66143809820437E+05, -6.72722080912177E+06)
-X( 3) = ( -2.19036078164655E-01,  1.37671705355676E-01)
-X( 4) = (  8.76368127587194E-01,  4.39195679576877E-02)
-
-X( 5) = (  5.64162487705464E-08, -2.13719699871523E-08)
-
-PATH NUMBER =       166
-
-ARCLEN =  1.84386067713753E+00
-NFE =  499
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996417194078E-01
-
-X( 1) = (  2.00254774622773E+00,  1.13775268229457E+00)
-X( 2) = ( -4.52519994189049E-01,  2.18654735135333E+00)
-X( 3) = (  4.93164831074191E-01,  3.89027575387209E-01)
-X( 4) = (  4.55088407736716E-01, -1.04632303929591E-01)
-
-X( 5) = ( -1.05541920156788E-01,  2.78535901897734E-01)
-
-PATH NUMBER =       167
-
-ARCLEN =  3.02754844516249E+00
-NFE =  246
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.22734358778483E-07
-
-X( 1) = (  3.28259962516656E+06, -1.94101562747002E+05)
-X( 2) = (  1.23150874125716E+00, -9.09853845131075E-02)
-X( 3) = (  1.68678111819607E+06, -7.94202747268989E+05)
-X( 4) = (  1.00586052487683E-01,  5.10910831090772E-03)
-
-X( 5) = ( -1.25347981183219E-07, -6.51653461571696E-08)
-
-PATH NUMBER =       168
-
-ARCLEN =  2.86477277606340E+00
-NFE =  314
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.18516846355718E-05
-
-X( 1) = ( -2.89586392068051E+05, -3.87814586056942E+05)
-X( 2) = (  6.14941115989471E-01, -6.22478561085610E-02)
-X( 3) = (  5.34192992123670E-01,  1.18748381311675E+00)
-X( 4) = ( -8.32064668278832E+04,  1.13012642081716E+05)
-
-X( 5) = (  1.44090854013750E-06, -9.07923718663974E-07)
-
-PATH NUMBER =       169
-
-ARCLEN =  7.75828867991437E+00
-NFE =  492
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99885975620240E-01
-
-X( 1) = ( -7.16328430411230E-01,  8.21777371297806E-02)
-X( 2) = (  1.82025848248461E+00, -9.50279950880405E-01)
-X( 3) = ( -1.15292730946596E+00, -1.10127312258946E+00)
-X( 4) = (  9.06938912252326E-01,  1.40115913136894E-02)
-
-X( 5) = (  1.21843376361845E+00, -3.09468546217885E-02)
-
-PATH NUMBER =       170
-
-ARCLEN =  3.89023600013533E+00
-NFE =  184
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.34140634753050E-13
-
-X( 1) = ( -1.58456604342117E+12, -6.52131091232836E+11)
-X( 2) = ( -2.45953142657193E+12, -1.63590951807189E+10)
-X( 3) = (  1.59628421586619E+12,  3.99194425736734E+12)
-X( 4) = (  4.68242873244280E-01,  7.16736378148810E-04)
-
-X( 5) = (  1.23177536963739E-13,  2.07237710065505E-13)
-
-PATH NUMBER =       171
-
-ARCLEN =  4.29132227606638E+00
-NFE =  364
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98036131426905E-01
-
-X( 1) = (  8.82983350725055E-01, -3.69293952096223E-02)
-X( 2) = (  3.64764616076420E-01, -2.49733362102349E-01)
-X( 3) = ( -1.03701635234339E+00, -1.94595554757725E-01)
-X( 4) = (  6.44586353695518E-03, -2.12540226527690E-01)
-
-X( 5) = (  1.79231876043128E+00,  1.24161104005813E+00)
-
-PATH NUMBER =       172
-
-ARCLEN =  1.99824651194529E+00
-NFE =  244
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.79856301048952E-01
-
-X( 1) = (  8.03296610382769E-01,  5.22182841282949E-02)
-X( 2) = (  6.56498972333756E-01, -1.28132005789508E-01)
-X( 3) = ( -7.79315936838078E-01, -2.41538698368732E-01)
-X( 4) = ( -2.52130465472911E-01, -2.62056508550072E-01)
-
-X( 5) = ( -2.01423223282514E-01,  1.19067369501856E+00)
-
-PATH NUMBER =       173
-
-ARCLEN =  2.30688335954603E+00
-NFE =  417
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99561833150922E-01
-
-X( 1) = (  8.26701886837172E-01,  4.48015816874188E-01)
-X( 2) = (  6.51602658428094E-01, -4.04938615214430E-01)
-X( 3) = ( -7.10851181289368E-01,  9.50069263480421E-02)
-X( 4) = (  3.03352221696489E-01, -3.34390387729017E-01)
-
-X( 5) = ( -2.92250918531639E-01,  6.91856534627630E-01)
-
-PATH NUMBER =       174
-
-ARCLEN =  2.48717729662851E+00
-NFE =  448
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999985897651E-01
-
-X( 1) = ( -3.38147215485200E+00,  3.85066921580037E+00)
-X( 2) = (  5.61711642565236E-02,  5.75657432583537E-01)
-X( 3) = (  9.52742138764676E-01,  4.36331603518618E-01)
-X( 4) = (  5.54584578735284E-01, -2.03247442447869E-02)
-
-X( 5) = (  2.37467010750729E-02,  1.13760582619839E-01)
-
-PATH NUMBER =       175
-
-ARCLEN =  1.92455870548181E+00
-NFE =  219
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.17818419560451E-07
-
-X( 1) = (  7.00744632791232E+05,  3.86403259529687E+06)
-X( 2) = ( -1.58632290734245E+00,  2.82113057437764E-01)
-X( 3) = (  6.47555001121114E-01, -3.63097247833163E-02)
-X( 4) = (  6.79046264463136E+05, -1.65871659202209E+06)
-
-X( 5) = ( -7.96382383171199E-08,  1.85319985620018E-07)
-
-PATH NUMBER =       176
-
-ARCLEN =  2.28511319778698E+00
-NFE =  201
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.50111232678640E-13
-
-X( 1) = ( -1.48063140783770E+11,  8.68560069533864E+10)
-X( 2) = ( -1.44714545692939E+11, -7.78484050467141E+10)
-X( 3) = (  4.95869572507700E-01,  2.23949869547094E-03)
-X( 4) = ( -5.85532329970223E+10, -8.76625703782297E+10)
-
-X( 5) = (  3.83874136362754E-12,  1.07068732135493E-12)
-
-PATH NUMBER =       177
-
-ARCLEN =  2.42591380017526E+00
-NFE =  278
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.42181956337770E-08
-
-X( 1) = (  5.63178015226593E+06, -1.29123832122280E+05)
-X( 2) = (  1.07234519622324E-01, -2.45094699193113E-01)
-X( 3) = (  8.75960760951985E-01,  7.01346618279933E-02)
-X( 4) = ( -5.45050445602614E+06,  2.48962230212977E+05)
-
-X( 5) = ( -1.15814294268809E-07, -5.96053006691327E-09)
-
-PATH NUMBER =       178
-
-ARCLEN =  4.61511382655172E+00
-NFE =  436
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99984565172202E-01
-
-X( 1) = (  2.09857385288808E-01, -7.02957076013023E-02)
-X( 2) = ( -2.04702682331788E-01,  3.62977882951204E-01)
-X( 3) = (  1.33850182375289E+00, -8.61717134930027E-01)
-X( 4) = (  9.43760285504376E-01,  6.57367117995373E-02)
-
-X( 5) = ( -5.40100905071859E-01, -5.60894058971941E-01)
-
-PATH NUMBER =       179
-
-ARCLEN =  3.82386879873459E+00
-NFE =  546
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99040464652250E-01
-
-X( 1) = (  8.36915996491955E-01, -7.58028488394258E-01)
-X( 2) = (  8.75079302643578E-01,  1.72153150855807E-01)
-X( 3) = ( -1.74621269778849E+00,  3.29048500896491E-01)
-X( 4) = ( -1.33038531941811E+00,  5.68394451113542E-01)
-
-X( 5) = (  3.12960510444641E-01,  5.19759560417477E-01)
-
-PATH NUMBER =       180
-
-ARCLEN =  6.48218436180453E+00
-NFE =  312
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.25580893842668E-08
-
-X( 1) = (  7.33363865386834E-01, -1.95104259471519E-02)
-X( 2) = ( -2.52339160492547E-01, -7.35370276255109E-01)
-X( 3) = ( -3.43123962486103E+07,  5.15253200381911E+07)
-X( 4) = ( -1.01199575386850E+07, -7.88507174876025E+07)
-
-X( 5) = (  4.94631366442823E-09,  5.92428739783690E-09)
-
-PATH NUMBER =       181
-
-ARCLEN =  1.53543074246438E+00
-NFE =  470
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98512831355603E-01
-
-X( 1) = (  6.13737168735910E-01,  4.63822431521888E-01)
-X( 2) = (  7.01983367905893E-01, -1.26433621080057E-01)
-X( 3) = ( -6.27103215770774E-01, -1.50053897317683E-01)
-X( 4) = ( -1.69992021227241E-01, -8.34426383196552E-01)
-
-X( 5) = ( -1.88789025618751E-02,  5.87440943454533E-01)
-
-PATH NUMBER =       182
-
-ARCLEN =  1.97985486152470E+00
-NFE =  219
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.34377397001037E-08
-
-X( 1) = (  9.93794026638293E+06,  2.10474926924533E+06)
-X( 2) = (  7.27488552310099E-01, -1.23729122908869E-01)
-X( 3) = ( -7.63509753288057E-02,  2.87921273246323E-01)
-X( 4) = ( -9.45668852782595E+06, -2.08975972661475E+06)
-
-X( 5) = ( -6.41191645980345E-08,  1.16637975884127E-08)
-
-PATH NUMBER =       183
-
-ARCLEN =  2.27206971500862E+00
-NFE =  294
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999980E-01
-
-X( 1) = ( -2.91035076403151E+01,  1.59501358624340E+02)
-X( 2) = (  1.08678740063044E-01,  1.19931949898995E-01)
-X( 3) = (  9.32604508838470E-01, -6.55499908046534E-02)
-X( 4) = (  1.14201027702095E+02, -6.93306719894056E+01)
-
-X( 5) = (  4.83953418528078E-04,  5.66138283447469E-03)
-
-PATH NUMBER =       184
-
-ARCLEN =  2.96891945130838E+00
-NFE =  244
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.06708770498529E-09
-
-X( 1) = ( -9.85780723943277E+08, -3.65044686877325E+08)
-X( 2) = (  2.06910302890573E+08, -8.95952997538292E+08)
-X( 3) = (  6.49859106377679E-01,  5.22785532468582E-03)
-X( 4) = ( -1.00920531963715E+00, -2.97333910538712E-01)
-
-X( 5) = (  8.80726968460234E-10, -8.55961948564334E-10)
-
-PATH NUMBER =       185
-
-ARCLEN =  1.79611300033818E+00
-NFE =  171
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.80453008403029E-09
-
-X( 1) = ( -7.90757071570498E+08,  1.41947934746425E+09)
-X( 2) = (  3.39754482934631E-01,  3.78700406251113E-01)
-X( 3) = ( -1.97672677820772E+08,  9.94155926311284E+08)
-X( 4) = (  3.02397678615513E+07, -3.65298066563921E+08)
-
-X( 5) = (  4.41895181470947E-11,  2.64227358038032E-10)
-
-PATH NUMBER =       186
-
-ARCLEN =  2.63042826748837E+00
-NFE =  302
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999976E-01
-
-X( 1) = ( -2.72726952138051E+01,  1.60382466801957E+02)
-X( 2) = (  7.90755724454964E-01, -9.86039018881765E-02)
-X( 3) = ( -6.31924107395130E-02,  1.08590834597470E-01)
-X( 4) = (  1.02396440168034E+02, -7.35149557711357E+01)
-
-X( 5) = (  3.49890911056577E-04,  5.42713905758175E-03)
-
-PATH NUMBER =       187
-
-ARCLEN =  3.52017611125672E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999873E-01
-
-X( 1) = ( -3.34079044047067E+01,  1.14947734520730E+02)
-X( 2) = (  1.14908667463000E+00,  3.77661608672444E-02)
-X( 3) = (  4.85614997606603E-03,  6.30086856593221E-02)
-X( 4) = (  5.23499882205307E+01, -2.30425624644285E+01)
-
-X( 5) = (  1.95999154883900E-04,  6.97582020669464E-03)
-
-PATH NUMBER =       188
-
-ARCLEN =  3.18973120784463E+00
-NFE =  237
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.59174559319274E-07
-
-X( 1) = ( -4.27841698669236E-02,  4.89813391103704E-03)
-X( 2) = (  1.11983724779367E+00,  1.10112435384044E-02)
-X( 3) = ( -8.62461775659086E+05, -7.16302369995461E+05)
-X( 4) = ( -1.65821425279072E+05, -8.25180296452212E+05)
-
-X( 5) = (  5.38461494453669E-07, -2.03559087998443E-07)
-
-PATH NUMBER =       189
-
-ARCLEN =  4.78293324069685E+00
-NFE =  305
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.40353826628182E-05
-
-X( 1) = (  9.72948264541326E-01, -7.37172860688525E-03)
-X( 2) = (  4.36418678729364E-02,  6.92130214214653E-02)
-X( 3) = (  1.03097763824248E+05, -6.15634256190434E+04)
-X( 4) = (  9.83469943807678E+04, -4.66449035037174E+04)
-
-X( 5) = ( -3.49542235454929E-06, -5.33877339197212E-06)
-
-PATH NUMBER =       190
-
-ARCLEN =  1.99275508366123E+00
-NFE =  614
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99949406868512E-01
-
-X( 1) = (  6.88918646028776E-01,  6.69558248661292E-01)
-X( 2) = (  6.51527710046615E-01, -1.45590822412434E-01)
-X( 3) = ( -7.02387011776130E-01, -2.66433693724586E-01)
-X( 4) = ( -6.33333450724135E-01, -1.75458996499611E+00)
-
-X( 5) = (  4.99964340131924E-02,  4.48343434185944E-01)
-
-PATH NUMBER =       191
-
-ARCLEN =  2.38592027752460E+00
-NFE =  269
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999982E-01
-
-X( 1) = (  1.56364937578472E+02,  8.54289987293718E+01)
-X( 2) = (  8.13222631420296E-01, -1.11312938721161E-01)
-X( 3) = ( -8.81896424910239E-02,  1.34069559058761E-01)
-X( 4) = ( -4.00761739537456E+01, -1.33498506882178E+02)
-
-X( 5) = ( -4.58121778563932E-03,  1.98323300999164E-03)
-
-PATH NUMBER =       192
-
-ARCLEN =  2.03742432146549E+00
-NFE =  266
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999503E-01
-
-X( 1) = (  4.22757630503897E+01,  7.27016539897569E+01)
-X( 2) = ( -3.19716028222875E-01,  2.16797438562882E-01)
-X( 3) = (  8.84463293829032E-01,  5.92893228516590E-02)
-X( 4) = (  1.09376731820396E+01, -2.48558332525574E+01)
-
-X( 5) = ( -7.13201119763321E-03,  6.40273305667764E-03)
-
-PATH NUMBER =       193
-
-ARCLEN =  1.71242064757560E+00
-NFE =  315
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999849323E-01
-
-X( 1) = (  2.95757135712101E+00,  1.82308327258612E+01)
-X( 2) = ( -4.14653989202564E-01,  2.71478857791941E-02)
-X( 3) = (  8.71021149215162E-01,  1.24051088455346E-03)
-X( 4) = ( -3.66940827427775E+00, -5.96676179599293E+00)
-
-X( 5) = ( -1.51974723951236E-02,  3.21767188052139E-02)
-
-PATH NUMBER =       194
-
-ARCLEN =  1.62924323945724E+00
-NFE =  137
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.93283440523565E-14
-
-X( 1) = ( -2.48762471254566E+11, -4.21119488226758E+10)
-X( 2) = ( -2.67331615971305E+11,  7.12290117220681E+10)
-X( 3) = (  4.99876620606473E-01,  5.40184875319306E-04)
-X( 4) = (  7.86901048997054E+10, -6.96705936729541E+10)
-
-X( 5) = (  1.43287733566332E-12, -1.53937084433620E-13)
-
-PATH NUMBER =       195
-
-ARCLEN =  2.70410613242880E+00
-NFE =  288
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.04748141743327E-06
-
-X( 1) = (  4.78117376813119E+05,  2.46171065768669E+05)
-X( 2) = (  4.68783766844503E-01, -1.10527802415325E-01)
-X( 3) = (  7.74219218198231E-01,  9.24393972460280E-01)
-X( 4) = ( -8.20220873066396E+05, -5.62758527351433E+05)
-
-X( 5) = ( -7.88210592119230E-07,  7.59335977413178E-07)
-
-PATH NUMBER =       196
-
-ARCLEN =  2.34902629404085E+00
-NFE =  220
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.74591301705473E-08
-
-X( 1) = (  3.68570666819995E+08,  6.17441099700028E+08)
-X( 2) = (  5.19751504723661E-01,  2.31367962027446E-01)
-X( 3) = (  3.39092106429433E+08, -5.22352686925717E+07)
-X( 4) = ( -2.22222271279148E+08, -6.74914425916170E+08)
-
-X( 5) = ( -6.27449359667537E-10,  5.05357838909148E-10)
-
-PATH NUMBER =       197
-
-ARCLEN =  2.11214026388872E+00
-NFE =  204
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.94447325153184E-08
-
-X( 1) = ( -8.44081969679486E-02, -1.42837823167794E-01)
-X( 2) = (  8.13056148063518E-01,  8.69807055390789E-02)
-X( 3) = ( -9.68990394747590E+06, -5.19528714963512E+05)
-X( 4) = ( -1.81251556644974E+06, -7.97636832959453E+06)
-
-X( 5) = (  5.67388239635573E-08,  1.00879280607691E-08)
-
-PATH NUMBER =       198
-
-ARCLEN =  2.33126110862462E+00
-NFE =  243
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999910E-01
-
-X( 1) = (  1.19364038166070E+01,  7.82922556090737E+01)
-X( 2) = (  1.11905951580685E+00, -3.03298784642995E-03)
-X( 3) = (  5.23341527082493E-02,  8.50932839757716E-03)
-X( 4) = ( -2.24389174790601E+01, -1.57308884450715E+02)
-
-X( 5) = (  8.49785911478743E-04,  6.65265700932529E-03)
-
-PATH NUMBER =       199
-
-ARCLEN =  1.32692711221559E+00
-NFE =  176
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93157044304784E-01
-
-X( 1) = ( -6.03657331899231E-02,  1.49249720842280E-02)
-X( 2) = (  8.27269741306917E-01,  1.30776233207123E-02)
-X( 3) = ( -5.11667550886736E-01,  4.65069119246311E-02)
-X( 4) = (  4.93859007766863E-01, -6.70308048602697E-01)
-
-X( 5) = (  2.76619248132960E-01,  4.62147463913048E-01)
-
-PATH NUMBER =       200
-
-ARCLEN =  1.78821108103618E+00
-NFE =  335
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998723909889E-01
-
-X( 1) = ( -8.98774946729708E-01,  2.68121153153853E+00)
-X( 2) = (  5.26720224304028E-01,  4.87864336146142E-01)
-X( 3) = (  4.78072859763620E-01, -1.87633665959818E-01)
-X( 4) = (  2.18407165891217E+00, -3.31080354142887E+00)
-
-X( 5) = (  5.95853665699951E-02,  1.78608102856801E-01)
-
-PATH NUMBER =       201
-
-ARCLEN =  2.18851297663632E+00
-NFE =  253
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999982E-01
-
-X( 1) = (  7.82652935262580E+01,  1.19898012937497E+02)
-X( 2) = ( -1.13599184025096E-01,  1.33582873711250E-01)
-X( 3) = (  9.74759898697835E-01,  1.86059671090916E-02)
-X( 4) = (  3.18892655873670E+01, -4.28110937116229E+01)
-
-X( 5) = ( -4.69747471072334E-03,  3.59507517387269E-03)
-
-PATH NUMBER =       202
-
-ARCLEN =  1.43102492761767E+00
-NFE =  108
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.12826181190076E-14
-
-X( 1) = ( -1.14212715498168E+12, -2.19793811617167E+13)
-X( 2) = ( -2.21483085295522E+13, -2.55467603385209E+13)
-X( 3) = (  4.63550830852542E-01, -4.13361145424058E-02)
-X( 4) = ( -5.05847534006330E+12,  1.19955754877870E+13)
-
-X( 5) = (  1.47906860370473E-15, -1.47210802575737E-14)
-
-PATH NUMBER =       203
-
-ARCLEN =  2.55772993147279E+00
-NFE =  375
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999973E-01
-
-X( 1) = (  5.68624635536359E+01, -1.57173768339298E+01)
-X( 2) = (  1.06500091664090E-01, -4.40294133988212E-02)
-X( 3) = (  9.71819039007787E-01,  1.35647264817108E-02)
-X( 4) = ( -1.62198078680149E+02,  4.22413317976818E+01)
-
-X( 5) = ( -7.41933664470232E-03,  1.41842178050536E-03)
-
-PATH NUMBER =       204
-
-ARCLEN =  2.65429045986136E+00
-NFE =  281
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999976E-01
-
-X( 1) = (  3.40138705463592E+01,  5.40644865072501E+01)
-X( 2) = (  9.78564709614993E-02, -8.31845063501816E-02)
-X( 3) = (  9.98750660011168E-01,  2.13886154332522E-02)
-X( 4) = ( -9.35849584156184E+01, -1.54014864027592E+02)
-
-X( 5) = ( -8.26519744764301E-04,  6.97324693729356E-03)
-
-PATH NUMBER =       205
-
-ARCLEN =  1.67775665977456E+00
-NFE =  200
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.74124692286171E-10
-
-X( 1) = (  6.48328588049780E+09,  3.46776641287636E+09)
-X( 2) = (  4.75133984314988E-01, -2.46380498270137E-01)
-X( 3) = (  6.09285702392694E+09, -3.85049565695264E+09)
-X( 4) = ( -7.13139496452034E+09, -5.06138028380571E+09)
-
-X( 5) = ( -5.74931593218947E-11,  8.60532565344352E-13)
-
-PATH NUMBER =       206
-
-ARCLEN =  1.93838189445589E+00
-NFE =  216
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.41764947396553E-11
-
-X( 1) = (  7.43304783376377E+08, -4.02765507000798E+08)
-X( 2) = (  5.03938802533925E-01,  2.90860661829441E-01)
-X( 3) = (  4.81919967644011E+08, -9.43629057255171E+08)
-X( 4) = ( -1.78863312231119E+08,  2.00800620143766E+09)
-
-X( 5) = ( -1.85054733526941E-10, -2.04649247092896E-10)
-
-PATH NUMBER =       207
-
-ARCLEN =  1.92766849019081E+00
-NFE =  216
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.87517846438271E-09
-
-X( 1) = (  1.66635610449111E+07, -4.45436142538075E+07)
-X( 2) = (  5.08090384989454E-01,  2.83629925731059E-01)
-X( 3) = (  2.48307966116539E+04, -2.85347332041266E+07)
-X( 4) = ( -3.38342028048769E+07,  1.13002652667469E+08)
-
-X( 5) = ( -3.60927959497685E-09, -6.59347378740649E-09)
-
-PATH NUMBER =       208
-
-ARCLEN =  1.30577212166559E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96473833013588E-01
-
-X( 1) = (  1.50357545093261E-02, -5.89556183375658E-02)
-X( 2) = (  8.60524931910518E-01, -1.10212358205775E-03)
-X( 3) = ( -4.14854464462819E-01,  3.68344328874869E-01)
-X( 4) = (  5.38902832233955E-01, -7.74732909874348E-01)
-
-X( 5) = (  1.82259748936391E-01,  4.50017533287667E-01)
-
-PATH NUMBER =       209
-
-ARCLEN =  2.45736386570583E+00
-NFE =  260
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.45358569357585E-08
-
-X( 1) = (  7.21106249661664E-01,  9.13607804199989E-01)
-X( 2) = (  4.86543511295695E-01, -1.06812016146324E-01)
-X( 3) = (  4.01823797284984E+06, -3.73853737247436E+07)
-X( 4) = ( -2.41445285239147E+07,  1.81585037071551E+07)
-
-X( 5) = ( -8.51801882869631E-09, -1.92325853815923E-08)
-
-PATH NUMBER =       210
-
-ARCLEN =  1.50657826216403E+00
-NFE =  486
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98486381729384E-01
-
-X( 1) = ( -4.30987674802350E-01,  7.45437835665761E-01)
-X( 2) = (  1.53394838325318E-01,  3.33394651289832E-01)
-X( 3) = (  9.89766162728998E-01,  2.00850385635396E-01)
-X( 4) = (  7.65205334137511E-01, -5.78964731067727E-01)
-
-X( 5) = ( -2.97704428054469E-02,  4.06669767644517E-01)
-
-PATH NUMBER =       211
-
-ARCLEN =  3.31628599263412E+00
-NFE =  435
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999995289E-01
-
-X( 1) = ( -1.20028715650547E+01, -6.75364220764085E+00)
-X( 2) = ( -3.73793544902514E-01,  2.44027339327086E-02)
-X( 3) = (  8.79683132510151E-01,  3.72470857476381E-03)
-X( 4) = (  3.97658202358423E+01, -5.92631425871053E+00)
-
-X( 5) = (  2.18224675741559E-02, -1.41228112584072E-02)
-
-PATH NUMBER =       212
-
-ARCLEN =  1.59844605588329E+00
-NFE =  179
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.06745675069258E-10
-
-X( 1) = ( -8.50339174192147E+09, -8.15038618999462E+09)
-X( 2) = (  5.19199699082956E-01,  3.61323383756548E-01)
-X( 3) = ( -1.39988172147438E+10,  2.56734041645687E+09)
-X( 4) = (  1.05560682800890E+10,  1.51163325444465E+10)
-
-X( 5) = (  3.02846840216208E-11, -1.12843311084188E-11)
-
-PATH NUMBER =       213
-
-ARCLEN =  2.37483293157999E+00
-NFE =  327
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.33055491523280E-08
-
-X( 1) = (  3.38037647810067E+07, -1.07155640706326E+07)
-X( 2) = (  1.51005845737208E+07,  5.93223606167195E+06)
-X( 3) = (  7.23822516515808E-01,  8.50667504623845E-02)
-X( 4) = ( -4.03289762187329E-01,  3.88556764464271E-01)
-
-X( 5) = ( -1.95791023302992E-08, -6.65254905741867E-09)
-
-PATH NUMBER =       214
-
-ARCLEN =  1.98144802856293E+00
-NFE =  277
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999979E-01
-
-X( 1) = ( -1.86190982065448E+01, -1.77439254014268E+02)
-X( 2) = ( -4.47130767920378E-02, -9.83441042943276E-02)
-X( 3) = ( -1.03192889607185E+02,  1.28504464050515E+02)
-X( 4) = (  1.00368517643249E+00, -1.90524794209347E-02)
-
-X( 5) = (  3.86053012627221E-03, -4.50075848629701E-04)
-
-PATH NUMBER =       215
-
-ARCLEN =  1.77513129902147E+00
-NFE =  242
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.39447882882416E-07
-
-X( 1) = (  5.57919934214598E+04, -1.98740769109222E+05)
-X( 2) = (  4.81746770434046E-01,  1.05099916263517E-01)
-X( 3) = ( -4.43007485570311E+05, -7.40456770029086E+03)
-X( 4) = (  6.70170122864965E-01, -9.77671572794485E-01)
-
-X( 5) = (  1.32689337488655E-06, -5.36966520728560E-07)
-
-PATH NUMBER =       216
-
-ARCLEN =  2.62666784044285E+00
-NFE =  298
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999995608E-01
-
-X( 1) = (  4.65937085189611E-01,  1.01036188185024E+00)
-X( 2) = (  4.91817720485704E-01, -1.15919817397011E-01)
-X( 3) = (  1.06254755240042E+01, -1.44091329337937E+00)
-X( 4) = ( -2.71975832268527E+01, -2.59698255832188E+01)
-
-X( 5) = ( -1.74070578555593E-02,  4.00016593429663E-02)
-
-PATH NUMBER =       217
-
-ARCLEN =  3.64228361817754E+00
-NFE =  358
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999730E-01
-
-X( 1) = (  8.04259990630456E-03, -3.30347959658074E-04)
-X( 2) = (  9.19346643518946E-01,  3.11530310024673E-03)
-X( 3) = (  1.85283250950109E+01,  1.74958376785848E+01)
-X( 4) = (  1.81751068034344E+01, -6.70143136444931E+01)
-
-X( 5) = (  1.09589076473499E-02,  2.60060744952708E-02)
-
-PATH NUMBER =       218
-
-ARCLEN =  1.85083889057188E+00
-NFE =  454
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999395E-01
-
-X( 1) = ( -1.72627809541212E-01, -1.30354216908267E-01)
-X( 2) = (  5.75345941423706E-01, -1.37104461430326E-01)
-X( 3) = ( -1.31780035239991E+01,  7.32242067563894E+00)
-X( 4) = (  8.77185743754158E-01, -2.03900779651086E-01)
-
-X( 5) = (  3.92006324056712E-02,  2.52685055663146E-02)
-
-PATH NUMBER =       219
-
-ARCLEN =  1.96144974110990E+00
-NFE =  170
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.14425961602768E-14
-
-X( 1) = (  5.00525352000659E-01,  2.07656064364875E-02)
-X( 2) = (  6.82511028832452E+13, -7.45548218634123E+12)
-X( 3) = (  1.71690078167455E+12,  5.49370673426074E+13)
-X( 4) = (  4.02402757972249E+13, -6.35085098614653E+13)
-
-X( 5) = ( -2.02726832716771E-15,  8.18204011487911E-15)
-
-PATH NUMBER =       220
-
-ARCLEN =  1.40351460761408E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98341749340675E-01
-
-X( 1) = (  1.28518805459336E-01,  6.67036992885409E-01)
-X( 2) = (  1.68119853124782E-01,  8.50360715069044E-01)
-X( 3) = (  7.82190813635886E-01,  2.84896830458484E-01)
-X( 4) = (  5.75243712204304E-01, -6.51336267348890E-01)
-
-X( 5) = ( -2.58552091059286E-02,  3.59784105953618E-01)
-
-PATH NUMBER =       221
-
-ARCLEN =  1.37491862345043E+00
-NFE =  159
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84496671820701E-01
-
-X( 1) = ( -6.08441803905569E-01,  7.13232307885770E-01)
-X( 2) = ( -1.28832820727131E+00,  6.42207163192908E-01)
-X( 3) = (  7.05908108806760E-01,  1.88285444229637E-01)
-X( 4) = (  6.30386211302965E-01, -8.35214286595976E-02)
-
-X( 5) = (  3.04250554807931E-01,  2.96352725638375E-01)
-
-PATH NUMBER =       222
-
-ARCLEN =  6.52939948627412E+00
-NFE =  690
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999984E-01
-
-X( 1) = ( -7.95710372694497E-02,  4.84986591974382E-03)
-X( 2) = ( -2.62790592945461E+02, -2.52360715135252E+02)
-X( 3) = ( -7.22998873887638E+00,  1.22967180500664E+01)
-X( 4) = (  8.93764723541702E-01, -3.70388271508970E-03)
-
-X( 5) = (  3.45041332403222E-04, -2.40451779241662E-03)
-
-PATH NUMBER =       223
-
-ARCLEN =  2.87221750225056E+00
-NFE =  559
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99966337247306E-01
-
-X( 1) = (  7.25373487583911E-01, -1.91345359328407E-01)
-X( 2) = (  4.78882621205592E-02,  2.67769722625857E-01)
-X( 3) = ( -6.27882680682548E-01,  9.60063112529600E-02)
-X( 4) = (  1.01682333957185E+00, -7.82945846721223E-02)
-
-X( 5) = (  1.01002884419637E+00,  1.90650022332542E-01)
-
-PATH NUMBER =       224
-
-ARCLEN =  2.51247997612994E+00
-NFE =  247
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.35258825260266E-09
-
-X( 1) = (  1.47417419965115E+08, -2.66566165589466E+08)
-X( 2) = (  4.70188687657449E-01,  2.55583810356304E-01)
-X( 3) = ( -5.52083404641508E+07, -8.42124925790970E+08)
-X( 4) = ( -5.71031895182298E+08,  1.35160110478321E+09)
-
-X( 5) = ( -2.40350829191528E-10, -4.99419147855472E-10)
-
-PATH NUMBER =       225
-
-ARCLEN =  1.49740744907728E+00
-NFE =  148
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32159584790787E-10
-
-X( 1) = ( -2.14799249623078E+07,  5.93387484394484E+08)
-X( 2) = (  4.91636281202634E-01, -2.76456631563609E-01)
-X( 3) = (  2.05591625063532E+09, -1.55657091663954E+08)
-X( 4) = ( -2.58729737802375E+09, -1.60708876425144E+08)
-
-X( 5) = ( -2.16195501171607E-10,  1.06728789543188E-10)
-
-PATH NUMBER =       226
-
-ARCLEN =  2.12987902253564E+00
-NFE =  339
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988050084823E-01
-
-X( 1) = (  1.00324567605147E+00, -5.62033481346379E-01)
-X( 2) = (  4.74101533214444E-02,  1.57480999902738E-01)
-X( 3) = ( -1.15888049400407E+00, -3.87339317550259E-01)
-X( 4) = (  9.50294752470971E-01,  5.35264667514271E-02)
-
-X( 5) = (  4.21237782270018E-01, -3.51074488886215E-01)
-
-PATH NUMBER =       227
-
-ARCLEN =  1.26087105168790E+00
-NFE =  273
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99059846321842E-01
-
-X( 1) = (  1.67558523568010E-01, -1.21195812381608E-01)
-X( 2) = (  5.81040964250698E-01,  3.43371148608239E-01)
-X( 3) = ( -8.48965672363193E-01,  4.13556112600723E-01)
-X( 4) = (  1.12074845174937E+00, -1.58001529304146E-01)
-
-X( 5) = (  3.41507419075818E-01,  3.22978383184747E-01)
-
-PATH NUMBER =       228
-
-ARCLEN =  2.04593015363893E+00
-NFE =  404
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99928321626947E-01
-
-X( 1) = (  7.46390541628113E-01,  5.59236180136307E-01)
-X( 2) = ( -2.08998220380195E-01,  1.00122560514797E+00)
-X( 3) = ( -4.26161568248293E-03,  8.60893586185275E-02)
-X( 4) = (  9.17953481578144E-01, -1.27106412383738E-02)
-
-X( 5) = (  1.46458689725318E-01,  6.03570559347567E-01)
-
-PATH NUMBER =       229
-
-ARCLEN =  1.56096534671513E+00
-NFE =  391
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99320125989490E-01
-
-X( 1) = (  1.13070821855290E-01,  6.36794799508583E-01)
-X( 2) = ( -9.38863515783988E-01,  6.59610030523842E-01)
-X( 3) = (  3.25899063414600E-01,  1.99662804147787E-01)
-X( 4) = (  7.95780362470623E-01, -2.90997010723384E-02)
-
-X( 5) = (  3.55556206390993E-01,  4.59387312858743E-01)
-
-PATH NUMBER =       230
-
-ARCLEN =  1.45543316550906E+00
-NFE =  503
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99529606314232E-01
-
-X( 1) = (  1.73711415986788E-02,  7.09956779755199E-01)
-X( 2) = ( -5.88973296113223E-01,  1.37281572756670E+00)
-X( 3) = (  8.51151624530262E-01,  4.63279391031844E-01)
-X( 4) = (  5.88586463228484E-01, -2.67253041914113E-02)
-
-X( 5) = (  6.60703378702417E-02,  3.37859540608601E-01)
-
-PATH NUMBER =       231
-
-ARCLEN =  6.83895184196167E+00
-NFE =  222
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.37903372218808E-13
-
-X( 1) = (  1.61329317783581E+12,  7.77409670361746E+12)
-X( 2) = ( -1.22506983577004E+13,  1.82526907642297E+13)
-X( 3) = (  7.21045413723817E+12, -8.43645643560591E+12)
-X( 4) = (  4.93479697868210E-01, -2.52617662587656E-03)
-
-X( 5) = (  9.07603798974005E-14,  4.17512704097012E-14)
-
-PATH NUMBER =       232
-
-ARCLEN =  2.50171788549559E+00
-NFE =  215
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.03045900125568E-08
-
-X( 1) = ( -1.32948203289839E+00,  3.79389218990949E-02)
-X( 2) = (  3.15232241545034E+07,  1.11198498536566E+08)
-X( 3) = (  5.55351571739178E+07,  2.86149946847593E+07)
-X( 4) = (  6.29723800758802E-01,  2.26881862320928E-03)
-
-X( 5) = ( -8.87517164009080E-10,  6.12951011458697E-09)
-
-PATH NUMBER =       233
-
-ARCLEN =  2.57351986625652E+00
-NFE =  316
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999586E-01
-
-X( 1) = (  1.76327211836022E+02, -7.56954677901228E+01)
-X( 2) = (  5.37669096039488E+01, -3.32265909268353E+02)
-X( 3) = (  1.51327514755481E-02, -3.21573314124493E-02)
-X( 4) = (  1.01578589617851E+00, -3.20061060571784E-02)
-
-X( 5) = ( -1.10211606857354E-03, -1.04738394407630E-03)
-
-PATH NUMBER =       234
-
-ARCLEN =  1.73975460830941E+00
-NFE =  418
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99873724692428E-01
-
-X( 1) = (  7.15774897222209E-01, -5.35871430600635E-01)
-X( 2) = (  2.07641204717214E-01, -1.74364399064121E-01)
-X( 3) = ( -1.30885107021961E+00,  2.14740647231758E-01)
-X( 4) = (  9.04837846026439E-01, -1.12951426435381E-01)
-
-X( 5) = (  6.11032431654591E-01, -9.61815088295200E-02)
-
-PATH NUMBER =       235
-
-ARCLEN =  5.89234763843358E+00
-NFE =  322
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.34805863250850E-08
-
-X( 1) = ( -2.46563283823088E+07, -3.71744966021584E+07)
-X( 2) = (  4.98856343738127E-01, -2.89575258972287E-01)
-X( 3) = (  3.57722696291822E+07,  3.68262309012683E+07)
-X( 4) = ( -3.22764880187904E+07, -2.43696281999658E+07)
-
-X( 5) = (  2.98444002253288E-09,  2.53978964754936E-08)
-
-PATH NUMBER =       236
-
-ARCLEN =  1.96655481316376E+00
-NFE =  361
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99973930722958E-01
-
-X( 1) = (  6.86229995860552E-01,  3.34165979157581E-01)
-X( 2) = (  2.17081671156977E-01, -2.01259263906350E-02)
-X( 3) = ( -5.89867315855656E-01,  6.07299316907959E-01)
-X( 4) = (  9.50859080757350E-01, -1.86350049496934E-01)
-
-X( 5) = (  1.29174874477051E-01,  6.44387408357084E-01)
-
-PATH NUMBER =       237
-
-ARCLEN =  1.80179111536796E+00
-NFE =  280
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99897398724048E-01
-
-X( 1) = (  7.96603327448872E-01,  4.50150100616917E-01)
-X( 2) = ( -9.99600377025337E-02,  5.65361746803879E-01)
-X( 3) = ( -5.81954393184746E-01,  4.38446228143427E-02)
-X( 4) = (  7.69512418179238E-01, -7.85630349972852E-02)
-
-X( 5) = (  3.89237683121275E-01,  6.11235167859061E-01)
-
-PATH NUMBER =       238
-
-ARCLEN =  3.72610538137297E+00
-NFE =  424
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995806043038E-01
-
-X( 1) = (  1.41898277072202E+00,  8.00005098855992E-01)
-X( 2) = ( -1.11719420393738E+00,  1.20961377551624E+00)
-X( 3) = (  3.84985513609822E-03, -3.52547672896592E-02)
-X( 4) = (  8.44563589150423E-01, -6.00057959460925E-02)
-
-X( 5) = (  4.08119696801811E-01,  9.52297741286529E-01)
-
-PATH NUMBER =       239
-
-ARCLEN =  1.48999848813222E+00
-NFE =  439
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99944643242016E-01
-
-X( 1) = (  5.53252796134437E-01,  1.26361619563330E+00)
-X( 2) = ( -6.16508631129963E-01,  1.77793341159347E+00)
-X( 3) = (  6.19918109371308E-01,  5.27516935058058E-01)
-X( 4) = (  5.28724290437611E-01, -7.30098376790671E-02)
-
-X( 5) = (  1.60608017410572E-02,  2.66178295485574E-01)
-
-PATH NUMBER =       240
-
-ARCLEN =  2.72195711378260E+00
-NFE =  234
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.57019028310226E-09
-
-X( 1) = ( -1.69696871382153E+00, -1.31908962365461E-01)
-X( 2) = (  6.84861239194760E+08,  2.22832702277507E+08)
-X( 3) = (  3.40840312120522E+08, -1.88070288845646E+08)
-X( 4) = (  6.33032748878908E-01, -1.09076890665523E-02)
-
-X( 5) = ( -8.96282429974386E-10,  4.29652553986248E-10)
-
-PATH NUMBER =       241
-
-ARCLEN =  1.99614548233758E+00
-NFE =  157
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.98467802542370E-13
-
-X( 1) = ( -2.74550276679973E+12,  1.15686660334873E+12)
-X( 2) = ( -7.99627195117971E+12,  1.00049369536216E+12)
-X( 3) = (  3.95760549824550E+12,  9.40400503565911E+12)
-X( 4) = (  3.38086304203241E-01,  5.60335203609463E-02)
-
-X( 5) = (  3.57089845973851E-14,  7.89414649100817E-14)
-
-PATH NUMBER =       242
-
-ARCLEN =  2.05901675072574E+00
-NFE =  248
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.68541741073128E-07
-
-X( 1) = (  3.99962698326688E+05, -3.24986951180848E+06)
-X( 2) = (  4.73379016556902E-01, -1.09353199862157E-01)
-X( 3) = ( -3.81170853472190E+06,  2.90657936209153E+06)
-X( 4) = (  6.94338509255112E-01,  9.85607607726396E-01)
-
-X( 5) = (  1.57886040627917E-07, -1.94031945290616E-09)
-
-PATH NUMBER =       243
-
-ARCLEN =  2.06450777450970E+00
-NFE =  325
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99855132816340E-01
-
-X( 1) = (  8.83598344936629E-01, -2.44356851484453E-01)
-X( 2) = (  2.56301355959356E-01, -3.18016891127898E-01)
-X( 3) = ( -1.42552754500412E+00,  1.23886373515397E-01)
-X( 4) = (  5.48714543289191E-01, -2.14265877531706E-01)
-
-X( 5) = (  8.35240129267308E-01,  2.05024744806518E-02)
-
-PATH NUMBER =       244
-
-ARCLEN =  3.74222097564227E+00
-NFE =  462
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96488735884179E-01
-
-X( 1) = (  8.90351911610562E-01, -1.67371434864112E-01)
-X( 2) = (  6.12069966288228E-01,  7.10353318296552E-02)
-X( 3) = ( -1.27347703383185E+00, -9.06981745295879E-01)
-X( 4) = ( -6.65815831516381E-02,  1.50759906037757E-01)
-
-X( 5) = (  1.05856159788235E+00, -7.77306315350134E-01)
-
-PATH NUMBER =       245
-
-ARCLEN =  5.07361676033149E+00
-NFE =  381
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99967797768713E-01
-
-X( 1) = (  8.31578913031969E-01,  9.33630859533091E-03)
-X( 2) = ( -1.61192484219921E-02,  1.24715519821567E-01)
-X( 3) = ( -1.38924715341937E+00, -4.93134110350179E-01)
-X( 4) = (  7.50580037516255E-01,  1.69683887432006E-01)
-
-X( 5) = (  5.90924848480409E-01, -1.86249328378327E-01)
-
-PATH NUMBER =       246
-
-ARCLEN =  4.82444490846042E+00
-NFE =  467
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99925064674319E-01
-
-X( 1) = (  1.37733787439030E+00,  5.73960161589388E-01)
-X( 2) = ( -8.36277985179793E-01,  8.85777717438988E-01)
-X( 3) = ( -1.13200500734000E+00, -7.75659425161577E-01)
-X( 4) = (  9.09966736769586E-01, -1.39827898433723E-02)
-
-X( 5) = (  5.62533573591474E-01, -1.50482031108178E-01)
-
-PATH NUMBER =       247
-
-ARCLEN =  1.11707708950787E+01
-NFE =  279
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.08230322915367E-12
-
-X( 1) = (  3.35407917818594E+11,  2.38287748229088E+11)
-X( 2) = ( -1.26600793735655E+11,  6.17708060598824E+11)
-X( 3) = (  5.08513941870061E-01,  2.06447838435308E-02)
-X( 4) = (  3.71834608846275E+11, -3.42139827163004E+11)
-
-X( 5) = (  9.70575751929950E-13,  1.49260134417115E-12)
-
-PATH NUMBER =       248
-
-ARCLEN =  2.94719379053350E+00
-NFE =  220
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.69297981261033E-08
-
-X( 1) = ( -1.64935823636127E+06, -6.41980055456160E+06)
-X( 2) = (  1.48521548396302E+07, -1.84815002950687E+06)
-X( 3) = (  6.31176339016724E-01,  2.15382569012194E-05)
-X( 4) = ( -1.37844820745704E+00, -3.57638529810486E-02)
-
-X( 5) = ( -1.02458833291545E-07,  2.56619412552952E-08)
-
-PATH NUMBER =       249
-
-ARCLEN =  3.24410166934694E+00
-NFE =  295
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99597614478287E-01
-
-X( 1) = (  6.10914459403685E-01,  3.01723895563141E-01)
-X( 2) = (  2.12530631834137E-01, -3.25549039393029E-01)
-X( 3) = ( -9.96038762978212E-01, -4.42819682149481E-02)
-X( 4) = (  5.33050188013530E-01, -1.99638916370807E-01)
-
-X( 5) = (  8.58650757759141E-01,  7.23682863067888E-01)
-
-PATH NUMBER =       250
-
-ARCLEN =  4.99747179636571E+00
-NFE =  385
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99929704001054E-01
-
-X( 1) = ( -4.07142905269405E-01, -6.64663593535863E-01)
-X( 2) = (  1.72880536278149E+00, -1.81685122213849E-01)
-X( 3) = (  3.86163400266373E-01, -7.64183070140565E-01)
-X( 4) = (  5.00816954949146E-01,  1.17732191764703E-01)
-
-X( 5) = ( -1.26046869451565E+00,  7.16585919062570E-02)
-
-PATH NUMBER =       251
-
-ARCLEN =  2.98457942681878E+00
-NFE =  329
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.07338296949734E-07
-
-X( 1) = ( -1.31294333676810E-01, -1.26315533204484E-03)
-X( 2) = (  9.16366742045300E+06,  5.45898258859281E+06)
-X( 3) = (  6.12312721060824E+06, -5.80870302105583E+06)
-X( 4) = (  8.94984426180610E-01,  1.08371393125602E-04)
-
-X( 5) = ( -7.58676423928434E-08,  2.14252092156620E-08)
-
-PATH NUMBER =       252
-
-ARCLEN =  2.48020944450351E+00
-NFE =  399
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99900388183046E-01
-
-X( 1) = (  9.56005700727161E-01,  2.02644693116490E-01)
-X( 2) = (  5.60100818446911E-01, -4.53875236605829E-01)
-X( 3) = ( -7.60460137015334E-01, -1.61239917563011E+00)
-X( 4) = ( -2.13215777928311E-02,  2.45880971777540E-01)
-
-X( 5) = ( -2.36586588211875E-01, -5.23911369059585E-01)
-
-PATH NUMBER =       253
-
-ARCLEN =  5.00241241784627E+00
-NFE =  447
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.80333307977143E-01
-
-X( 1) = (  7.35839240148399E-01, -1.09720604161604E-01)
-X( 2) = (  6.21075568771715E-01, -4.02305199614907E-02)
-X( 3) = ( -1.04531519703958E+00, -6.54583369067483E-01)
-X( 4) = ( -1.20466314184581E-01,  2.48959871989100E-02)
-
-X( 5) = (  2.44921645840439E+00,  4.31998243168974E-02)
-
-PATH NUMBER =       254
-
-ARCLEN =  3.66841572082065E+00
-NFE =  299
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.57326929006480E-06
-
-X( 1) = (  3.50742295303725E+05, -5.20339031069157E+05)
-X( 2) = (  4.60936268629646E-01,  8.98617048324113E-02)
-X( 3) = (  7.70324598301827E-01, -8.50986152995575E-01)
-X( 4) = ( -2.60105312717921E+05,  1.07492508604117E+05)
-
-X( 5) = ( -4.47892203369579E-07, -1.18336751479012E-06)
-
-PATH NUMBER =       255
-
-ARCLEN =  1.61541689220778E+01
-NFE =  390
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999989792348E-01
-
-X( 1) = ( -2.36256692392753E+00,  4.16533048941545E+00)
-X( 2) = ( -1.47851809935859E-01, -1.72787323218549E-01)
-X( 3) = (  9.37026270465006E-01, -3.07079370239840E-02)
-X( 4) = (  5.93820332571019E-01, -1.86323191323506E-02)
-
-X( 5) = ( -2.75902197719970E-04,  1.47857419638044E-01)
-
-PATH NUMBER =       256
-
-ARCLEN =  2.13058909239474E+00
-NFE =  202
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.16463056435144E-08
-
-X( 1) = ( -9.16008337277575E+07,  1.58175302566988E+08)
-X( 2) = ( -2.80721858710829E-01,  1.44803946869505E-01)
-X( 3) = (  5.86585731470502E-01,  2.21045307692308E-01)
-X( 4) = (  8.12981962014031E+07, -1.44266629531918E+08)
-
-X( 5) = (  1.66098217390396E-09,  3.22246437764158E-09)
-
-PATH NUMBER =       257
-
-ARCLEN =  2.79072983606502E+00
-NFE =  360
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.88746721090390E-01
-
-X( 1) = ( -6.23155395888179E-01,  5.54753358014488E-01)
-X( 2) = ( -1.61073187398873E+00,  6.87264316749252E-01)
-X( 3) = (  6.12897934718206E-01, -1.03865190009632E-01)
-X( 4) = (  6.90253148737196E-01,  1.85606622364442E-01)
-
-X( 5) = (  4.16298905833288E-01,  1.46501128427898E-01)
-
-PATH NUMBER =       258
-
-ARCLEN =  3.33298898932335E+00
-NFE =  532
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991011925634E-01
-
-X( 1) = (  1.89977185257736E+00,  1.56458298376010E+00)
-X( 2) = (  5.28947141439872E-01,  6.35320758937169E-02)
-X( 3) = ( -1.19514905718755E+00, -6.22781152155343E-01)
-X( 4) = (  4.49278129549829E-01, -8.39829914305320E-01)
-
-X( 5) = ( -3.15967237420798E-01,  4.62971451924687E-01)
-
-PATH NUMBER =       259
-
-ARCLEN =  3.26349916131104E+00
-NFE =  288
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90843817638476E-01
-
-X( 1) = (  9.21274247833993E-01, -3.58255194297391E-01)
-X( 2) = (  6.62957275691383E-01,  1.28043350063943E+00)
-X( 3) = (  4.31549011903121E-01, -7.76830798364491E-01)
-X( 4) = (  1.11913413233798E-01,  6.09586466721672E-01)
-
-X( 5) = ( -9.30683317001890E-01,  2.53112736237055E-01)
-
-PATH NUMBER =       260
-
-ARCLEN =  2.81054428099145E+00
-NFE =  300
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99866163744257E-01
-
-X( 1) = (  7.03191204609254E-01, -6.56693737178153E-01)
-X( 2) = (  7.15391043145093E-01,  8.90886886958273E-02)
-X( 3) = ( -2.06127865318218E+00, -9.36466936670820E-01)
-X( 4) = ( -3.06802731832656E-01,  2.11965401678435E-01)
-
-X( 5) = (  4.34931757030765E-01, -1.60108235389182E-01)
-
-PATH NUMBER =       261
-
-ARCLEN =  3.22819387547540E+00
-NFE =  232
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.29467907469689E-08
-
-X( 1) = (  7.29591114032097E-01,  1.52087087147718E-03)
-X( 2) = ( -1.00160902209728E+00, -4.74780919190705E-02)
-X( 3) = ( -1.19939866191759E+07, -2.96460136168578E+06)
-X( 4) = (  1.41253668168541E+07, -7.22543581913624E+06)
-
-X( 5) = (  3.63187891808960E-08, -1.32778728212032E-08)
-
-PATH NUMBER =       262
-
-ARCLEN =  2.18639610435544E+00
-NFE =  342
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.83718369784516E-01
-
-X( 1) = (  5.07160171766460E-01,  1.44197065913800E-01)
-X( 2) = (  7.04691230300445E-01, -6.68869156195578E-02)
-X( 3) = ( -7.37579759284651E-01, -5.62076175344928E-01)
-X( 4) = ( -1.07312732552340E-01, -3.67329738921845E-01)
-
-X( 5) = (  4.48214171757728E-01,  1.27711936725805E+00)
-
-PATH NUMBER =       263
-
-ARCLEN =  2.43117737897348E+00
-NFE =  354
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999976E-01
-
-X( 1) = (  1.18124389995565E+02,  1.16002835190411E+02)
-X( 2) = (  1.11953541815035E-01, -1.60952528185023E-01)
-X( 3) = (  9.57458671747551E-01,  7.25253198498853E-02)
-X( 4) = (  6.18215978021674E+00, -1.31281548878486E+02)
-
-X( 5) = ( -4.30312762346288E-03,  3.42472343580739E-03)
-
-PATH NUMBER =       264
-
-ARCLEN =  1.94652126151971E+00
-NFE =  337
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999558596E-01
-
-X( 1) = (  5.33590156157017E+00,  1.57665592783847E+01)
-X( 2) = (  5.06308113108173E-01,  4.77719417711249E-01)
-X( 3) = (  4.78462538045022E-01, -2.06344140910002E-01)
-X( 4) = (  4.26508176846031E+00, -1.09327654110936E+01)
-
-X( 5) = ( -2.01738561972103E-02,  4.34782159974119E-02)
-
-PATH NUMBER =       265
-
-ARCLEN =  1.82963269214119E+00
-NFE =  202
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.01554291207492E-07
-
-X( 1) = ( -8.21093907680523E+06, -1.01470161145937E+07)
-X( 2) = (  1.00361721462724E-01, -1.74204795245758E-01)
-X( 3) = (  8.41952886176266E-01,  8.82421401888351E-02)
-X( 4) = (  8.17407855914431E+06,  9.64484103208597E+06)
-
-X( 5) = (  3.25781069047569E-08, -3.79927987281424E-08)
-
-PATH NUMBER =       266
-
-ARCLEN =  1.85973260115125E+00
-NFE =  234
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.12423474199220E-07
-
-X( 1) = ( -1.12140656456902E+05,  1.15955653844068E+06)
-X( 2) = ( -4.98181772402477E+05,  1.24665460642535E+05)
-X( 3) = (  8.78340066187329E-01,  3.41196868705101E-03)
-X( 4) = ( -1.77723648730339E-01, -1.84560845951100E-03)
-
-X( 5) = (  2.61334884416303E-08,  7.92644851564130E-07)
-
-PATH NUMBER =       267
-
-ARCLEN =  3.39026498566606E+00
-NFE =  422
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98206944514231E-01
-
-X( 1) = ( -1.23985773114884E+00,  1.14436337644592E+00)
-X( 2) = ( -1.92706927826527E+00, -1.20723726926198E+00)
-X( 3) = (  8.28810315521503E-01,  2.46684599542131E-03)
-X( 4) = ( -1.01331109673931E+00, -1.62568622208103E-02)
-
-X( 5) = (  4.99013070307154E-01,  6.12875777035880E-01)
-
-PATH NUMBER =       268
-
-ARCLEN =  3.19922416251049E+00
-NFE =  330
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99881508839206E-01
-
-X( 1) = (  8.28182553972186E-01, -2.24300938454795E-01)
-X( 2) = (  3.37585896193855E-01,  1.28801377947667E-01)
-X( 3) = (  5.54734345609323E-01, -4.23214513829400E-02)
-X( 4) = (  1.61564399206212E-01,  7.36585981873212E-01)
-
-X( 5) = ( -5.52631238643678E-01,  4.42827219374395E-02)
-
-PATH NUMBER =       269
-
-ARCLEN =  3.02789602120067E+00
-NFE =  239
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.52460961228345E-06
-
-X( 1) = ( -1.44860366175964E-02, -3.27026171640115E-01)
-X( 2) = (  7.22865273442589E-01,  2.53288603925127E-02)
-X( 3) = ( -3.51835750125949E+05, -2.35972525661180E+05)
-X( 4) = ( -2.03642777338889E+05, -5.95607519772386E+04)
-
-X( 5) = (  1.85393181634258E-06, -6.85238289541146E-07)
-
-PATH NUMBER =       270
-
-ARCLEN =  2.29542697060497E+00
-NFE =  273
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.83749547159075E-01
-
-X( 1) = (  4.11788188291849E-01, -2.77749621750571E-01)
-X( 2) = (  8.14833678999596E-01, -4.39141266932342E-02)
-X( 3) = ( -1.14607384309850E+00, -4.96140361359883E-01)
-X( 4) = ( -2.33005366148962E-01, -1.08228201670590E-01)
-
-X( 5) = (  8.99234151923566E-01,  4.37100666031114E-01)
-
-PATH NUMBER =       271
-
-ARCLEN =  1.49918063846357E+00
-NFE =  309
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.88476250192799E-01
-
-X( 1) = (  2.00066576723935E-01,  1.56526640524372E-01)
-X( 2) = (  7.87467728295338E-01, -3.81242831913435E-02)
-X( 3) = ( -4.98155069188963E-01, -3.14785517839047E-01)
-X( 4) = (  1.33671801568171E-01, -6.14091159555250E-01)
-
-X( 5) = (  2.49429736568274E-01,  7.26055101337009E-01)
-
-PATH NUMBER =       272
-
-ARCLEN =  1.73151887720003E+00
-NFE =  198
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.33183885623240E-08
-
-X( 1) = ( -1.05749608097213E+06,  5.90361857874230E+06)
-X( 2) = (  7.12655472372283E-01, -7.94754794661893E-02)
-X( 3) = ( -1.23154622299248E-01,  2.23990569038976E-01)
-X( 4) = (  1.05758827504585E+06, -5.61934613267342E+06)
-
-X( 5) = (  1.63298531883640E-08,  1.09169141390003E-07)
-
-PATH NUMBER =       273
-
-ARCLEN =  1.46034016274382E+00
-NFE =  368
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99949688029952E-01
-
-X( 1) = (  5.67750434655383E-01,  2.23165932974011E+00)
-X( 2) = (  5.12512299811133E-01,  5.03842423498343E-01)
-X( 3) = (  5.05680939195241E-01, -2.52522258013693E-01)
-X( 4) = (  1.97301713755867E-01, -1.73667536089154E+00)
-
-X( 5) = ( -6.69115444560734E-02,  2.16898233207907E-01)
-
-PATH NUMBER =       274
-
-ARCLEN =  1.81829089516565E+00
-NFE =  328
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.75250801309757E-01
-
-X( 1) = ( -3.85314818233815E-01,  5.90965648133295E-01)
-X( 2) = ( -1.17920680450131E+00,  5.84206214227495E-01)
-X( 3) = (  6.96683638073104E-01, -5.39386318201573E-04)
-X( 4) = (  5.86438748276478E-01,  3.14124072485278E-02)
-
-X( 5) = (  4.39278515542214E-01,  3.86414907510457E-01)
-
-PATH NUMBER =       275
-
-ARCLEN =  1.81964011826966E+00
-NFE =  256
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999987E-01
-
-X( 1) = ( -4.33755322117834E+00,  2.68547068761792E+01)
-X( 2) = (  5.36155402338661E-01,  1.00452017283096E+00)
-X( 3) = (  5.18268938982810E-01, -7.03758256692875E-01)
-X( 4) = (  4.84592598856748E-01,  4.64239241172253E-02)
-
-X( 5) = ( -6.35286751615253E-03,  2.53441202386632E-02)
-
-PATH NUMBER =       276
-
-ARCLEN =  2.68028318079768E+00
-NFE =  365
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999984265528E-01
-
-X( 1) = ( -6.81366704411335E+00, -9.23649488993328E-01)
-X( 2) = (  5.09680887992014E-01, -4.81382681600063E-01)
-X( 3) = (  4.94431070628139E-01,  1.89427935960209E-01)
-X( 4) = (  7.69098982937390E+00,  7.43396538842772E-01)
-
-X( 5) = (  1.02893961824777E-01, -6.59386740798855E-03)
-
-PATH NUMBER =       277
-
-ARCLEN =  3.68607393540456E+00
-NFE =  352
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96129756664345E-01
-
-X( 1) = (  4.50568824697261E-01, -7.40171771972657E-01)
-X( 2) = (  1.21385533147054E+00,  8.23733731697047E-02)
-X( 3) = ( -1.68308384240391E-01, -6.91132806234729E-01)
-X( 4) = (  2.19341375568958E-01,  2.95351859565820E-01)
-
-X( 5) = ( -1.10514723382033E+00, -8.27635163006652E-01)
-
-PATH NUMBER =       278
-
-ARCLEN =  2.05212096233605E+00
-NFE =  388
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99984481994041E-01
-
-X( 1) = ( -1.18327596433762E+00, -1.12727679287626E+00)
-X( 2) = (  9.49653402959700E-01,  4.75468550844032E-02)
-X( 3) = ( -1.77659425539642E+00, -9.49987623699229E-01)
-X( 4) = ( -4.44000933317372E-02, -2.34967196245433E-02)
-
-X( 5) = (  2.35851812807863E-01, -1.48671081197355E-02)
-
-PATH NUMBER =       279
-
-ARCLEN =  1.56775742951987E+00
-NFE =  238
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92703456082355E-01
-
-X( 1) = (  1.67311379991289E-02, -2.13969252908543E-01)
-X( 2) = (  8.90754487380697E-01, -1.38345921985011E-02)
-X( 3) = ( -1.11858911120063E+00, -2.22784896264483E-01)
-X( 4) = (  1.51066562603108E-01, -3.04762963542660E-01)
-
-X( 5) = (  4.53228386458253E-01,  3.21547022627088E-01)
-
-PATH NUMBER =       280
-
-ARCLEN =  1.27406713869508E+00
-NFE =  306
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97751798965326E-01
-
-X( 1) = ( -5.63290004204068E-02,  7.96291609648591E-02)
-X( 2) = (  9.18948921546222E-01,  5.50226269087620E-02)
-X( 3) = ( -7.83561839361014E-01,  1.32617379074531E-01)
-X( 4) = (  5.34597273138864E-01, -7.69537486136589E-01)
-
-X( 5) = (  2.41298997255230E-01,  3.58544848851781E-01)
-
-PATH NUMBER =       281
-
-ARCLEN =  2.19899033752321E+00
-NFE =  283
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999979E-01
-
-X( 1) = ( -1.83770883671875E+01,  1.25171032993765E+02)
-X( 2) = (  7.76633575140259E-01, -5.59941073260414E-02)
-X( 3) = ( -4.25781707905678E-02,  1.82697671925783E-01)
-X( 4) = (  6.22591832585983E+01, -2.20073097753219E+02)
-
-X( 5) = (  1.91417260722532E-03,  4.26141634579556E-03)
-
-PATH NUMBER =       282
-
-ARCLEN =  2.05214178786613E+00
-NFE =  310
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999915191108E-01
-
-X( 1) = ( -4.34746722921595E+00,  2.40362981456608E+00)
-X( 2) = ( -4.14959450827199E-01,  1.58664804178751E-02)
-X( 3) = (  8.71217075304798E-01,  1.38238506105897E-03)
-X( 4) = (  4.58332159424393E+00, -5.28439210678044E+00)
-
-X( 5) = (  9.12692889321699E-02,  5.78028462998185E-02)
-
-PATH NUMBER =       283
-
-ARCLEN =  1.38500283690300E+00
-NFE =  391
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99060154274088E-01
-
-X( 1) = ( -6.61242765929533E-01,  1.32089248714922E+00)
-X( 2) = (  3.63413095669367E-01,  5.75448335346520E-01)
-X( 3) = (  7.13569180901135E-01,  3.32782695474250E-01)
-X( 4) = (  5.89259367214787E-01, -6.93723817560280E-01)
-
-X( 5) = (  1.03893357564437E-02,  2.49710642801432E-01)
-
-PATH NUMBER =       284
-
-ARCLEN =  1.92326016348473E+00
-NFE =  266
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999988E-01
-
-X( 1) = ( -2.28268869658041E+01,  1.41886380417330E+01)
-X( 2) = (  5.41161769246405E-01,  1.00025715316105E+00)
-X( 3) = (  4.87355801129487E-01,  4.43552672989063E-02)
-X( 4) = (  5.24083298010479E-01, -7.06512929159120E-01)
-
-X( 5) = (  1.40291557668035E-02,  2.14319264931157E-02)
-
-PATH NUMBER =       285
-
-ARCLEN =  2.71089868517827E+00
-NFE =  313
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999946E-01
-
-X( 1) = (  1.52871375126921E+02,  2.54018122801970E+01)
-X( 2) = (  1.27993341097490E+00,  6.04051599116830E-02)
-X( 3) = (  1.21756470863751E-01,  5.36737902354753E-02)
-X( 4) = ( -7.00068149735293E+01, -1.19857191180947E+02)
-
-X( 5) = ( -6.09033803644242E-03,  7.03544531593400E-04)
-
-PATH NUMBER =       286
-
-ARCLEN =  1.88696987186194E+00
-NFE =  192
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.24686166381286E-09
-
-X( 1) = (  3.31825993392442E+08, -1.63291699020108E+09)
-X( 2) = (  5.03640300282621E-01,  3.13870290583022E-01)
-X( 3) = ( -8.07089983123999E+08, -7.43646375044670E+08)
-X( 4) = ( -7.87101245370666E+08,  1.92460095891186E+09)
-
-X( 5) = (  3.64745290448807E-11, -2.98450565693401E-10)
-
-PATH NUMBER =       287
-
-ARCLEN =  1.96968997142646E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998438258E-01
-
-X( 1) = ( -8.89092290765813E+00, -2.63822354100753E+00)
-X( 2) = (  5.34799491943425E-01, -4.89882871123874E-01)
-X( 3) = ( -5.81841647122433E+00,  7.34581476449396E-01)
-X( 4) = (  5.42763592700918E-01,  1.95245473268427E-01)
-
-X( 5) = (  4.80544272002174E-02,  8.36249242708678E-03)
-
-PATH NUMBER =       288
-
-ARCLEN =  1.97938411086626E+00
-NFE =  232
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.12535565257058E-07
-
-X( 1) = ( -8.60598479676768E-02, -1.19465029669194E-01)
-X( 2) = (  8.03972410560505E-01,  9.19752530055780E-02)
-X( 3) = ( -5.39376442589996E+05,  1.27954089892630E+05)
-X( 4) = (  3.90607927399742E+05, -6.03841943814416E+05)
-
-X( 5) = (  8.46266065637497E-07,  1.20103515570185E-07)
-
-PATH NUMBER =       289
-
-ARCLEN =  1.17847891075234E+00
-NFE =  430
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94853985588125E-01
-
-X( 1) = ( -2.47941822962119E-01, -2.55726319073009E-01)
-X( 2) = (  6.69161593130226E-01, -1.05951553566890E-02)
-X( 3) = ( -9.89023323122840E-01,  2.43768034526381E-01)
-X( 4) = (  9.64649668338893E-01, -4.24336928488803E-01)
-
-X( 5) = (  3.58762477226174E-01,  2.04990007578179E-01)
-
-PATH NUMBER =       290
-
-ARCLEN =  2.91849940386123E+00
-NFE =  406
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999995423765E-01
-
-X( 1) = (  1.31232428244607E+00, -5.12866034030121E-03)
-X( 2) = (  2.01091535635949E+00,  1.18546290873119E-01)
-X( 3) = (  6.50583503147022E-02, -2.19594972416104E-03)
-X( 4) = ( -4.20304771650283E+00, -8.17954367912754E+00)
-
-X( 5) = (  5.38387961907952E-03,  1.60756805283362E-01)
-
-PATH NUMBER =       291
-
-ARCLEN =  1.51718774165289E+00
-NFE =  129
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.08630597652917E-14
-
-X( 1) = (  7.11134912025748E+12,  3.49197490334419E+12)
-X( 2) = (  1.26737671876400E+13,  2.51780486274539E+12)
-X( 3) = (  5.18318933993566E-01,  7.45539479175946E-03)
-X( 4) = ( -3.71374276012364E+12, -1.25023912485753E+13)
-
-X( 5) = ( -2.80381729118873E-14,  3.33276158406837E-14)
-
-PATH NUMBER =       292
-
-ARCLEN =  1.50997469135014E+00
-NFE =  126
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.26874558048249E-14
-
-X( 1) = (  4.39748611379616E+12,  2.51923130264723E+13)
-X( 2) = (  2.83833271420104E+13,  4.04013649530969E+13)
-X( 3) = (  4.80573543533680E-01,  3.10015829084489E-02)
-X( 4) = (  1.93434255231541E+13, -2.50524416543457E+13)
-
-X( 5) = (  5.26651205284834E-16,  1.19560936671925E-14)
-
-PATH NUMBER =       293
-
-ARCLEN =  4.55069820950836E+00
-NFE =  298
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999975E-01
-
-X( 1) = ( -1.48223907437170E+02,  2.81972725066919E+02)
-X( 2) = ( -5.45884891984803E+02, -4.57267224292461E+02)
-X( 3) = (  1.03659316917536E-01, -3.57141212072249E-03)
-X( 4) = (  9.13209723781296E-01, -6.72756805428238E-04)
-
-X( 5) = (  1.00012352343968E-03, -2.12295607001669E-03)
-
-PATH NUMBER =       294
-
-ARCLEN =  1.68088419334654E+00
-NFE =  234
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999417E-01
-
-X( 1) = ( -1.47730057848326E+02,  7.16735577103946E+01)
-X( 2) = ( -1.83609688639423E+02,  3.58252057361259E+02)
-X( 3) = ( -2.94759820959760E-03,  2.05836966382045E-02)
-X( 4) = (  9.96644694826423E-01,  8.44155606831912E-03)
-
-X( 5) = (  1.24514890977981E-03,  7.68974093620946E-04)
-
-PATH NUMBER =       295
-
-ARCLEN =  1.50420428616159E+00
-NFE =  227
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.03225540432157E-07
-
-X( 1) = ( -1.60208765552332E+07,  1.52796762590916E+07)
-X( 2) = ( -4.29159580976379E-02, -3.65684213448034E-01)
-X( 3) = (  1.08529767577927E+07,  3.71804725403733E+07)
-X( 4) = (  9.75581777160354E-01, -1.37712874727616E-01)
-
-X( 5) = ( -9.13583150129920E-10,  1.26987405078632E-08)
-
-PATH NUMBER =       296
-
-ARCLEN =  2.17121850868700E+00
-NFE =  222
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.81610195636927E-07
-
-X( 1) = ( -3.80156834911888E-01, -2.58961186915556E+00)
-X( 2) = (  3.83643799541416E-04, -5.94760501635023E-02)
-X( 3) = (  1.55691332405715E+07,  9.82748879301562E+06)
-X( 4) = ( -4.54458898807183E+06,  1.63730339703035E+07)
-
-X( 5) = ( -2.82673904510966E-08,  9.26233063240200E-09)
-
-PATH NUMBER =       297
-
-ARCLEN =  2.50763765875112E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999991E-01
-
-X( 1) = (  9.56826727937610E-01, -3.37227970599861E-02)
-X( 2) = (  3.04365007790495E-02,  1.54630568349491E-01)
-X( 3) = (  1.05304031162284E+01,  9.48032414814840E+01)
-X( 4) = ( -1.17310193769234E+02, -8.45057370446541E+01)
-
-X( 5) = ( -1.66352713944491E-04,  4.64309616154560E-03)
-
-PATH NUMBER =       298
-
-ARCLEN =  1.73549322578930E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998508981226E-01
-
-X( 1) = (  4.41221205720576E-01, -2.41090760356929E-01)
-X( 2) = (  4.76193909974784E-01,  4.07877336338349E-01)
-X( 3) = ( -2.07166751715656E+00, -9.52554242552375E-01)
-X( 4) = (  1.87974611714019E+00, -5.99270498470430E-01)
-
-X( 5) = (  2.59064178327581E-01, -6.73121394899563E-02)
-
-PATH NUMBER =       299
-
-ARCLEN =  2.48981115894832E+00
-NFE =  288
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99849946908682E-01
-
-X( 1) = (  6.20395797816709E-01,  3.09668316543213E-01)
-X( 2) = (  4.39388467935770E-02, -2.71997594208605E-01)
-X( 3) = ( -9.67072855162975E-01,  2.28245916168548E-02)
-X( 4) = (  6.49587172986535E-01, -1.57066703479578E-01)
-
-X( 5) = (  8.71781813633814E-01,  5.48496976769768E-01)
-
-PATH NUMBER =       300
-
-ARCLEN =  5.76605229861398E+00
-NFE =  362
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999891879051E-01
-
-X( 1) = (  2.84200335919858E+00,  7.54626635982362E-01)
-X( 2) = (  2.69637084916695E-01,  5.81731089986334E-01)
-X( 3) = (  4.88637517645488E-02,  6.12850727613526E-03)
-X( 4) = (  9.83154783762030E-01,  3.97119108167880E-02)
-
-X( 5) = ( -3.06944594449498E-01,  4.46851497704700E-02)
-
-PATH NUMBER =       301
-
-ARCLEN =  3.10312993277126E+00
-NFE =  221
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.34649776393591E-07
-
-X( 1) = ( -3.19809278030446E+06, -3.86763047825594E+06)
-X( 2) = (  3.12344885705175E+06, -2.75586202628714E+06)
-X( 3) = (  8.24733588175147E-02,  7.49187314404485E-03)
-X( 4) = (  9.13075170563139E-01,  5.28397103973064E-03)
-
-X( 5) = (  1.05259577170603E-07, -2.66950501901864E-07)
-
-PATH NUMBER =       302
-
-ARCLEN =  1.88744310019230E+00
-NFE =  274
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999985E-01
-
-X( 1) = ( -2.03451196418411E+02,  5.13613553331957E+01)
-X( 2) = ( -1.00576588621935E+03,  1.02003212758004E+03)
-X( 3) = (  1.33150734608488E-01, -9.63063829805278E-02)
-X( 4) = (  9.13825557125755E-01,  1.24711533992728E-01)
-
-X( 5) = (  5.08768396733722E-04,  9.27402563582158E-05)
-
-PATH NUMBER =       303
-
-ARCLEN =  3.71053914615845E+00
-NFE =  234
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999979E-01
-
-X( 1) = (  2.83696733049804E+02,  1.58097147703846E+02)
-X( 2) = ( -4.92763830988915E+02,  5.51897155252460E+02)
-X( 3) = (  9.21914810729776E-02,  1.51525141689967E-02)
-X( 4) = (  9.12373337793725E-01,  1.45421290761722E-03)
-
-X( 5) = (  2.05573421475482E-03,  8.50097340291291E-04)
-
-PATH NUMBER =       304
-
-ARCLEN =  2.38635692593121E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999991E-01
-
-X( 1) = ( -1.82853380325198E+00,  1.90955401739335E-01)
-X( 2) = ( -1.28404670505313E+02,  2.10448264217260E+02)
-X( 3) = ( -3.63545781534152E-01,  6.86755109259521E-02)
-X( 4) = (  8.73156164150491E-01, -1.25251737304356E-03)
-
-X( 5) = (  3.22089206565310E-03,  1.11467359117104E-03)
-
-PATH NUMBER =       305
-
-ARCLEN =  1.57962355545110E+00
-NFE =  204
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.25519946808789E-12
-
-X( 1) = (  1.46600590066436E+12,  3.95778271919042E+11)
-X( 2) = (  8.33039294670115E-01,  7.36870354107742E-02)
-X( 3) = (  6.31536256771591E+11, -2.29398171373867E+12)
-X( 4) = ( -7.12832609978086E+11,  1.27644801780279E+12)
-
-X( 5) = ( -1.44187721658195E-13, -1.36700438295445E-13)
-
-PATH NUMBER =       306
-
-ARCLEN =  1.31246697750488E+00
-NFE =  252
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97456542631124E-01
-
-X( 1) = (  8.86430965150459E-02, -7.19739476707095E-01)
-X( 2) = (  7.39035794306966E-02,  2.32168422148263E-04)
-X( 3) = ( -8.65100689609179E-01, -1.63453500757550E-01)
-X( 4) = (  9.97195799346979E-01, -3.68039161741490E-04)
-
-X( 5) = (  4.24674726929496E-01, -1.40881436174377E-01)
-
-PATH NUMBER =       307
-
-ARCLEN =  1.61815260391004E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998463400525E-01
-
-X( 1) = (  6.48178611967176E-01, -2.63995549366438E-01)
-X( 2) = (  7.29122135526588E-02, -6.59071525569415E-02)
-X( 3) = ( -2.14635096801170E+00, -6.90818793555262E-01)
-X( 4) = (  9.76540160448147E-01,  3.75450919461418E-02)
-
-X( 5) = (  3.00236449016244E-01, -1.18773391030300E-01)
-
-PATH NUMBER =       308
-
-ARCLEN =  2.25424414831444E+00
-NFE =  375
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99896747057867E-01
-
-X( 1) = (  5.64361641474723E-01,  2.70504921016823E-01)
-X( 2) = (  1.89172311017492E-01, -1.27939154629215E-01)
-X( 3) = ( -1.02394643288652E+00, -2.20242112276628E-01)
-X( 4) = (  7.54503741366183E-01, -1.67653478638333E-01)
-
-X( 5) = (  8.75302371924203E-01,  3.05621216286102E-01)
-
-PATH NUMBER =       309
-
-ARCLEN =  2.69816973854684E+00
-NFE =  469
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991871125267E-01
-
-X( 1) = (  6.48923275263625E-01,  1.46119146802526E-01)
-X( 2) = ( -9.19653759372711E-01, -3.77253909532608E-01)
-X( 3) = ( -1.55228397199245E+00, -5.05852994537795E-01)
-X( 4) = (  8.77774246561111E-01, -1.62667434510953E-01)
-
-X( 5) = (  3.07040037110733E-01, -1.58679724957704E-01)
-
-PATH NUMBER =       310
-
-ARCLEN =  6.38656323485459E+00
-NFE =  376
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999982E-01
-
-X( 1) = ( -1.61799182241491E+02,  3.08642963473129E+02)
-X( 2) = ( -5.98268019473924E+02, -4.99301508612809E+02)
-X( 3) = (  9.13072878413041E-01, -6.22982762564142E-04)
-X( 4) = (  1.02278720412035E-01, -3.34414305003145E-03)
-
-X( 5) = (  9.14955399070928E-04, -1.94260486107583E-03)
-
-PATH NUMBER =       311
-
-ARCLEN =  2.52511434299668E+00
-NFE =  440
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999768529600E-01
-
-X( 1) = ( -5.44956662324284E-01,  4.64271076196994E+00)
-X( 2) = ( -9.33010207474256E+00,  1.03336975452129E+00)
-X( 3) = (  5.25562533148240E-01,  2.43527189336983E-01)
-X( 4) = (  5.06060939130856E-01, -1.90237059476511E-01)
-
-X( 5) = (  1.34846745498636E-01,  1.96742786639339E-02)
-
-PATH NUMBER =       312
-
-ARCLEN =  3.38547470706134E+00
-NFE =  200
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.37409465098388E-12
-
-X( 1) = (  3.24283683819885E+12, -9.66086977521465E+12)
-X( 2) = (  2.38617616183595E+13, -5.41440091083337E+12)
-X( 3) = ( -8.86852247473435E+12, -1.50174780123104E+12)
-X( 4) = (  5.05927240125973E-01, -7.81594749036203E-02)
-
-X( 5) = ( -7.93279829845728E-14, -1.59915483632922E-14)
-
-PATH NUMBER =       313
-
-ARCLEN =  2.09769428102329E+00
-NFE =  220
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.55335162909338E-07
-
-X( 1) = ( -2.37638652691243E+06, -1.45115965393825E+06)
-X( 2) = ( -7.89093075359157E-01,  1.56365363767575E-01)
-X( 3) = ( -6.15926495006278E+06,  2.87091764679334E+06)
-X( 4) = (  7.46598712806641E-01,  6.60378635490883E-03)
-
-X( 5) = (  7.53936135224878E-08,  2.39783728464798E-08)
-
-PATH NUMBER =       314
-
-ARCLEN =  2.26078653910028E+00
-NFE =  259
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99864911709661E-01
-
-X( 1) = (  6.04952406709628E-01,  3.44740791200432E-01)
-X( 2) = ( -4.60789606730100E-03,  4.11557562313196E-01)
-X( 3) = ( -7.46019397539299E-01, -1.49909640657165E-01)
-X( 4) = (  8.58561636463799E-01, -5.60625051363873E-02)
-
-X( 5) = (  6.16628016543710E-01,  4.31460294985135E-01)
-
-PATH NUMBER =       315
-
-ARCLEN =  1.98498388566313E+00
-NFE =  186
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.99262443328215E-07
-
-X( 1) = (  2.14217451490435E+07, -2.35020904989052E+07)
-X( 2) = ( -3.13812820262179E+00, -2.67933482618448E-01)
-X( 3) = ( -4.47067729754108E+07,  9.23026554177312E+05)
-X( 4) = (  1.31538026409237E+00, -2.82899660080436E-01)
-
-X( 5) = (  1.30470235295351E-08, -1.02790837479684E-08)
-
-PATH NUMBER =       316
-
-ARCLEN =  2.46152944911325E+00
-NFE =  442
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99974053203014E-01
-
-X( 1) = (  5.61615712212344E-01,  2.24462329285987E-01)
-X( 2) = ( -4.55262879658373E-01, -7.97630787732402E-01)
-X( 3) = ( -1.43955342240173E+00,  3.22415505863371E-01)
-X( 4) = (  8.29575360761225E-01, -6.74667821143328E-02)
-
-X( 5) = (  6.12197259523816E-01, -3.23456493503869E-02)
-
-PATH NUMBER =       317
-
-ARCLEN =  4.12738693289569E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99589801677863E-01
-
-X( 1) = (  3.91516860221553E-01,  1.24716743927412E-01)
-X( 2) = ( -4.59037582419914E-01, -2.66256934625251E-01)
-X( 3) = ( -2.05070969205405E-02,  2.05475611270759E-01)
-X( 4) = (  6.69295986531396E-01, -3.37453104709786E-02)
-
-X( 5) = (  2.41305007509744E+00,  1.46998900104165E+00)
-
-PATH NUMBER =       318
-
-ARCLEN =  2.48495086436087E+01
-NFE =  603
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99839300198091E-01
-
-X( 1) = (  1.90886488474110E+00,  2.05728415915094E+00)
-X( 2) = ( -1.11905593861877E+00,  1.47427036522571E+00)
-X( 3) = ( -6.02149203586415E-01, -2.01360639982295E+00)
-X( 4) = (  7.55173487198355E-01, -3.64063621084211E-03)
-
-X( 5) = (  2.42367765799567E+00, -2.86747947548133E+00)
-
-PATH NUMBER =       319
-
-ARCLEN =  1.56615653420376E+00
-NFE =  242
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98869688623998E-01
-
-X( 1) = (  3.38890950755154E-01,  4.02905451583213E-01)
-X( 2) = (  3.81816510012458E-02,  1.37119744656904E+00)
-X( 3) = ( -4.67936210653163E-02, -1.80355486152832E-02)
-X( 4) = (  9.98118043455339E-01, -1.01475392888792E-02)
-
-X( 5) = (  2.24589560394501E-01,  3.87868822427961E-01)
-
-PATH NUMBER =       320
-
-ARCLEN =  1.75356166476351E+00
-NFE =  359
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99992145758702E-01
-
-X( 1) = (  3.11535458057422E-01,  1.12983583636069E+00)
-X( 2) = ( -2.81403586245536E+00,  3.64900724341701E+00)
-X( 3) = (  5.03160377557070E-01, -1.23093698928217E-01)
-X( 4) = (  6.44520440408274E-01,  4.27783940785522E-01)
-
-X( 5) = (  1.73406544483079E-01,  1.17087808128097E-01)
-
-PATH NUMBER =       321
-
-ARCLEN =  2.05403555526417E+00
-NFE =  184
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.26645170802615E-12
-
-X( 1) = (  5.33653621912966E+09,  2.23700729881623E+10)
-X( 2) = ( -1.74200431855392E+10,  1.58280009413924E+11)
-X( 3) = (  4.99935625607373E-01,  6.18337730262610E-05)
-X( 4) = (  2.61740070374909E+10,  2.12885647027425E+10)
-
-X( 5) = (  3.61400948230284E-12,  4.41789768830525E-12)
-
-PATH NUMBER =       322
-
-ARCLEN =  2.60739423143220E+00
-NFE =  221
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.50409850577642E-13
-
-X( 1) = (  1.28115415991303E+11, -7.62742653131809E+11)
-X( 2) = (  1.66308131122742E+12, -7.12574070210675E+11)
-X( 3) = ( -5.51144526260614E+11, -4.55169564274200E+11)
-X( 4) = (  4.92752001802777E-01,  4.10577039679076E-03)
-
-X( 5) = ( -4.91877372166272E-13, -5.04128206194054E-13)
-
-PATH NUMBER =       323
-
-ARCLEN =  3.93965144123998E+00
-NFE =  347
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99967465056242E-01
-
-X( 1) = (  3.61806390935048E-02, -2.40219750781484E-01)
-X( 2) = ( -1.73425762292907E+00, -1.41869946449490E+00)
-X( 3) = (  1.79485871072269E-01,  1.05223496707848E+00)
-X( 4) = (  8.36216826678923E-01, -1.19309346033561E-02)
-
-X( 5) = (  4.86650199097009E-01, -5.27165404501548E-01)
-
-PATH NUMBER =       324
-
-ARCLEN =  2.25938227165582E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99893524984786E-01
-
-X( 1) = (  6.90337558903171E-01, -1.01591617709449E+00)
-X( 2) = (  5.15265606080058E-01, -7.04651654825138E-01)
-X( 3) = ( -2.42742645987414E+00,  2.23667616464007E-01)
-X( 4) = (  5.43535784330706E-01,  1.07099401696840E-01)
-
-X( 5) = (  3.52628326172714E-01, -1.21051069676361E-01)
-
-PATH NUMBER =       325
-
-ARCLEN =  2.43202969986517E+00
-NFE =  222
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.76210073191993E-11
-
-X( 1) = ( -7.15743299728866E+09,  5.94642968854129E+09)
-X( 2) = (  5.22497531018627E-01,  2.96470599291421E-01)
-X( 3) = (  1.65476152694371E+10,  5.37239922683581E+09)
-X( 4) = ( -9.69237457500690E+09, -4.04122212171629E+09)
-
-X( 5) = ( -1.99319279885288E-11,  2.69149258544550E-11)
-
-PATH NUMBER =       326
-
-ARCLEN =  2.60880173349498E+02
-NFE =  672
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99969160630801E-01
-
-X( 1) = (  1.07284685143015E+00,  1.89123821479750E-01)
-X( 2) = (  2.43839338225447E-01,  5.05038715998794E-03)
-X( 3) = ( -1.04720026206963E+00,  2.49848756653484E-01)
-X( 4) = (  5.25758260800328E-01, -2.22052508711042E-01)
-
-X( 5) = (  4.28700736184268E-01,  8.85810011713769E-01)
-
-PATH NUMBER =       327
-
-ARCLEN =  1.16052428723662E+01
-NFE =  461
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99806141751165E-01
-
-X( 1) = (  1.36504519003872E+00,  4.09975974826595E-01)
-X( 2) = ( -4.27462828972924E-01,  9.18766975349758E-01)
-X( 3) = ( -5.79352166171301E-01, -7.80794879766863E-01)
-X( 4) = (  8.21351702917085E-01,  1.70027684768849E-01)
-
-X( 5) = (  1.29751601976659E+00, -8.44677045596526E-01)
-
-PATH NUMBER =       328
-
-ARCLEN =  7.87580660875455E+00
-NFE =  249
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.86446131484177E-07
-
-X( 1) = (  2.61282707510020E+06,  1.15117253258633E+06)
-X( 2) = ( -9.22781798646078E+04,  1.25524116701541E+06)
-X( 3) = (  9.00286978615949E-01, -2.88317544723369E-02)
-X( 4) = ( -1.31061510431526E-01, -6.24801084140824E-02)
-
-X( 5) = ( -3.03799389186194E-07,  1.11427918579924E-07)
-
-PATH NUMBER =       329
-
-ARCLEN =  9.40039104769705E+00
-NFE =  443
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999891650E-01
-
-X( 1) = (  5.16724633383451E+00,  4.14170459812035E+01)
-X( 2) = ( -5.34902090770168E+01, -5.06162086801259E+00)
-X( 3) = (  8.90771519832854E-01, -8.64170500488755E-04)
-X( 4) = ( -1.65655448258507E-01,  9.87854740666394E-03)
-
-X( 5) = (  6.10572840207460E-02,  2.34375167460455E-02)
-
-PATH NUMBER =       330
-
-ARCLEN =  5.46209618171122E+00
-NFE =  296
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.32060581800860E-07
-
-X( 1) = (  6.52632148655417E-01, -2.22635083273276E-02)
-X( 2) = ( -7.76159709766397E+05,  3.78094700635913E+06)
-X( 3) = ( -5.82860416694004E+04,  5.57723259642488E+05)
-X( 4) = ( -8.97218302244225E-02,  1.25493880197287E+00)
-
-X( 5) = (  1.38619918306363E-07,  1.39683214046935E-07)
-
-PATH NUMBER =       331
-
-ARCLEN =  2.30725851561970E+00
-NFE =  168
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.03059363762926E-12
-
-X( 1) = ( -3.21376178684015E+11, -5.03929304289140E+11)
-X( 2) = (  1.35942192663304E+12, -2.07424771044361E+12)
-X( 3) = (  5.04415856460367E-01,  1.75082288683430E-02)
-X( 4) = ( -9.10660463517492E+09, -7.07276364607685E+11)
-
-X( 5) = ( -4.08206671589917E-13, -2.64554057913952E-13)
-
-PATH NUMBER =       332
-
-ARCLEN =  2.95651126901042E+00
-NFE =  257
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999932E-01
-
-X( 1) = ( -1.40681059154095E-01, -1.59807958159256E-02)
-X( 2) = ( -3.04025054328731E+02, -3.43999546788702E+02)
-X( 3) = ( -1.19087885027422E+02,  6.90859833185663E-01)
-X( 4) = (  8.92501941771798E-01, -1.09794323180198E-03)
-
-X( 5) = (  5.77812728785981E-04, -1.68967405262592E-03)
-
-PATH NUMBER =       333
-
-ARCLEN =  2.88573628138536E+00
-NFE =  392
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99649377068704E-01
-
-X( 1) = (  1.02761691638555E+00,  2.81348537316333E-02)
-X( 2) = (  5.14176021404939E-01, -4.98744446650001E-01)
-X( 3) = ( -1.09293126745340E+00, -1.16734559988700E+00)
-X( 4) = (  1.49801613017594E-02,  1.23161088047480E-01)
-
-X( 5) = ( -1.19906771861786E-01, -7.65833338008231E-01)
-
-PATH NUMBER =       334
-
-ARCLEN =  4.21052948333692E+00
-NFE =  230
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.26385849968287E-08
-
-X( 1) = (  8.85018970047938E-01,  7.77573839033084E-02)
-X( 2) = (  2.29196788611912E-01, -2.70762251185812E-01)
-X( 3) = ( -3.93506261758458E+07, -3.40118875906726E+07)
-X( 4) = (  7.20001059384195E+05,  4.15269368848057E+07)
-
-X( 5) = (  8.02600270770858E-09, -1.30619959400535E-08)
-
-PATH NUMBER =       335
-
-ARCLEN =  4.72140782637486E+01
-NFE =  509
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.83147491735847E-01
-
-X( 1) = (  1.07517339022968E+00,  2.36355002045037E-01)
-X( 2) = (  3.06768969166918E-01,  3.14890367624543E-01)
-X( 3) = ( -8.77467869160065E-01, -8.24126584679820E-01)
-X( 4) = ( -1.13227434330525E-03,  5.80075916847307E-02)
-
-X( 5) = (  7.16709123187178E+00,  1.26595116567181E+00)
-
-PATH NUMBER =       336
-
-ARCLEN =  6.65992121446497E+00
-NFE =  430
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999982E-01
-
-X( 1) = (  5.34943649779727E+01,  3.02497307490835E+01)
-X( 2) = ( -4.44752506201408E-01, -2.02756530099964E-02)
-X( 3) = (  8.71333870160429E-01, -2.36496408844300E-03)
-X( 4) = ( -5.67809979603925E+00,  6.92052031272780E-01)
-
-X( 5) = ( -1.13724924682054E-02,  1.53925987554702E-03)
-
-PATH NUMBER =       337
-
-ARCLEN =  6.21820231247357E+01
-NFE =  592
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99465441254294E-01
-
-X( 1) = (  1.00463597903759E+00,  8.14942002334574E-02)
-X( 2) = (  4.13462562500481E-01, -2.13765055809490E-01)
-X( 3) = ( -1.22636811875520E+00, -8.77044567264583E-01)
-X( 4) = ( -1.90109758111604E-02, -5.51611521533219E-02)
-
-X( 5) = (  8.50137242644930E-01, -1.29468213623257E+00)
-
-PATH NUMBER =       338
-
-ARCLEN =  3.94675388043262E+00
-NFE =  186
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.62142793569730E-12
-
-X( 1) = ( -5.52278738504876E+12,  4.11691639219808E+12)
-X( 2) = ( -4.12043348770817E+12, -3.07075538578685E+12)
-X( 3) = (  1.83129332899090E+12,  8.11581775297703E+11)
-X( 4) = (  5.32642152663287E-01,  4.23203738222314E-02)
-
-X( 5) = (  1.48231687341349E-13,  1.41669174221620E-13)
-
-PATH NUMBER =       339
-
-ARCLEN =  3.56017676943663E+00
-NFE =  205
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.44125358136838E-08
-
-X( 1) = ( -6.64142292531127E+08, -6.93136001229369E+06)
-X( 2) = ( -6.79688125768819E+07, -5.76998966527364E+08)
-X( 3) = (  6.28769919622157E-01, -1.76729348509832E-02)
-X( 4) = (  4.88718331604022E-01, -3.66427797251739E+00)
-
-X( 5) = (  1.76933344996186E-09, -8.04872685535897E-10)
-
-PATH NUMBER =       340
-
-ARCLEN =  3.01562086212711E+00
-NFE =  164
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.35625306745955E-12
-
-X( 1) = ( -4.17430683378687E+11,  9.71153100312653E+11)
-X( 2) = ( -2.06393642914067E+12, -2.87624881044472E+11)
-X( 3) = (  4.65346907139209E-01, -2.35081138070253E-02)
-X( 4) = ( -8.54760387754882E+11,  2.54016183615088E+10)
-
-X( 5) = (  7.13878392163969E-13,  4.91596238542946E-14)
-
-PATH NUMBER =       341
-
-ARCLEN =  4.27573177505640E+00
-NFE =  362
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.91724901188096E-07
-
-X( 1) = ( -4.54456406335288E+05,  2.33041214239905E+05)
-X( 2) = (  4.96930965864831E-01,  1.21471901369410E-01)
-X( 3) = ( -1.27087346301118E+05,  1.13022059987676E+06)
-X( 4) = (  6.65465168518541E-01, -8.84369407235068E-01)
-
-X( 5) = (  1.15056417057842E-07,  4.45999950789068E-07)
-
-PATH NUMBER =       342
-
-ARCLEN =  2.59352351688366E+00
-NFE =  365
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996661355463E-01
-
-X( 1) = (  6.36684510588471E-01,  1.00229368139909E-01)
-X( 2) = ( -8.81285306862386E-01, -3.91297844558232E-01)
-X( 3) = ( -4.42343127756793E-01, -1.88049438308758E+00)
-X( 4) = (  7.57349811343532E-01, -2.87876667787372E-01)
-
-X( 5) = (  9.96009013665160E-02, -2.74252729205869E-01)
-
-PATH NUMBER =       343
-
-ARCLEN =  7.06571675743362E+00
-NFE =  200
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.67306742789185E-01
-
-X( 1) = (  4.81874369475871E-01, -3.61528462684117E-02)
-X( 2) = (  6.79346397592351E-01, -4.20690281969088E-02)
-X( 3) = ( -8.18550073333452E-01, -8.93571972000544E-01)
-X( 4) = ( -8.65410347392023E-02, -5.50688094220497E-02)
-
-X( 5) = (  2.51489650229112E+00, -3.62801455492484E-01)
-
-PATH NUMBER =       344
-
-ARCLEN =  5.88443240416557E+00
-NFE =  589
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998495086847E-01
-
-X( 1) = ( -1.67628304832012E+00,  1.92078162602560E+00)
-X( 2) = (  4.63025846317756E-01,  8.34454973861940E-02)
-X( 3) = (  3.04136646714901E-01, -1.28235876943860E+00)
-X( 4) = (  1.36913128692467E+00, -8.04716829900742E-01)
-
-X( 5) = (  1.94809159810875E-01,  2.91183875692254E-01)
-
-PATH NUMBER =       345
-
-ARCLEN =  5.58920703476547E+00
-NFE =  235
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.78008993955116E-08
-
-X( 1) = (  9.98345601761948E+07,  1.49756037765218E+08)
-X( 2) = (  4.82750970230566E-01, -3.10214034058091E-01)
-X( 3) = (  1.15811075588645E+07, -5.95644882153663E+07)
-X( 4) = ( -1.58482456894354E+07, -1.07413679002149E+08)
-
-X( 5) = ( -4.67915769948894E-09,  2.45639922747017E-09)
-
-PATH NUMBER =       346
-
-ARCLEN =  3.51773586799118E+00
-NFE =  395
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972571825687E-01
-
-X( 1) = ( -1.72654195107511E+00, -5.44236472506747E-01)
-X( 2) = (  4.54213866043437E-01, -9.88068112659452E-01)
-X( 3) = (  6.41761399838983E-01,  6.61228847897155E-01)
-X( 4) = (  5.77668117304925E-01, -7.73450440072122E-02)
-
-X( 5) = (  4.15324650290760E-01,  4.79526772274671E-01)
-
-PATH NUMBER =       347
-
-ARCLEN =  2.13153058322069E+00
-NFE =  321
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999964270E-01
-
-X( 1) = (  1.31259256153155E+00,  4.49724535778825E+01)
-X( 2) = (  6.00591378958261E+00,  1.65086601064143E+01)
-X( 3) = ( -2.95882701989676E-02, -6.23800049585138E-02)
-X( 4) = (  9.59435139678376E-01, -5.21607118568041E-02)
-
-X( 5) = ( -3.11425660971055E-03,  1.24498920158779E-02)
-
-PATH NUMBER =       348
-
-ARCLEN =  9.50861784647589E+00
-NFE =  222
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.19163069015669E-11
-
-X( 1) = ( -4.77671380484345E+11, -1.11142113481056E+12)
-X( 2) = (  9.38350584285322E+11,  1.12047917167723E+12)
-X( 3) = (  6.33775872003531E-01, -1.48687090775587E-01)
-X( 4) = (  6.78535853202550E+11,  1.63871858878446E+12)
-
-X( 5) = (  1.64250470863214E-12, -6.98387690994257E-13)
-
-PATH NUMBER =       349
-
-ARCLEN =  2.61813983894892E+00
-NFE =  235
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32987518054729E-11
-
-X( 1) = ( -3.60387337616892E+09,  1.11010106336629E+10)
-X( 2) = ( -4.93208950902033E+09,  3.29034553155103E+09)
-X( 3) = (  4.95095219812452E-01,  2.15500211365608E-04)
-X( 4) = ( -1.43290530116852E+09, -4.60099952415423E+08)
-
-X( 5) = (  1.79834617249769E-11,  5.62301250483718E-11)
-
-PATH NUMBER =       350
-
-ARCLEN =  5.88635808173664E+00
-NFE =  421
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991946035270E-01
-
-X( 1) = ( -1.04127737907541E+00,  1.10743986282982E-01)
-X( 2) = (  7.86068393253527E-01, -8.53367237476007E-02)
-X( 3) = ( -1.36014461972133E+00, -1.56152204089466E+00)
-X( 4) = ( -8.33143620189411E-01,  2.75081360836875E+00)
-
-X( 5) = (  8.18400693262832E-01, -1.52896313597633E-01)
-
-PATH NUMBER =       351
-
-ARCLEN =  3.99413624235198E+00
-NFE =  238
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.74381493074378E-01
-
-X( 1) = (  4.77768843560377E-01, -3.94953001081314E-01)
-X( 2) = (  7.38027053144429E-01, -1.12886017715820E-02)
-X( 3) = ( -1.04768621139740E+00, -8.81144358995667E-01)
-X( 4) = ( -3.67432395812689E-01,  1.25360684232870E-01)
-
-X( 5) = (  1.20120716445291E+00, -5.10841297423410E-01)
-
-PATH NUMBER =       352
-
-ARCLEN =  2.10942366978052E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87044608437458E-01
-
-X( 1) = (  1.62762239775805E-01,  2.80627724233514E-02)
-X( 2) = (  7.79743537826437E-01, -1.01978568213180E-02)
-X( 3) = ( -6.29117276921898E-01, -5.53846979190956E-01)
-X( 4) = (  1.84203376920202E-01, -4.05177984749083E-01)
-
-X( 5) = (  7.04549020695048E-01,  7.48866696098468E-01)
-
-PATH NUMBER =       353
-
-ARCLEN =  2.44695296474168E+00
-NFE =  419
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99952854842596E-01
-
-X( 1) = ( -6.06601817271877E-01,  1.04064533014324E+00)
-X( 2) = (  5.59843926831697E-01,  9.43611756106064E-02)
-X( 3) = ( -1.32102147446966E-01, -9.60088551126647E-01)
-X( 4) = (  1.64197758505725E+00, -1.11781230558389E+00)
-
-X( 5) = (  4.18651595381814E-01,  3.31522407900589E-01)
-
-PATH NUMBER =       354
-
-ARCLEN =  2.79157530680073E+00
-NFE =  312
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.10104023771240E-06
-
-X( 1) = (  8.16313840335699E+05,  4.05130383900219E+06)
-X( 2) = (  5.14198531209842E-01, -4.81505881313082E-01)
-X( 3) = (  4.96361036503863E-01,  1.93204137792544E-01)
-X( 4) = ( -1.05752805035520E+06, -3.87073612504611E+06)
-
-X( 5) = ( -3.61424344325187E-08,  1.51390395179501E-07)
-
-PATH NUMBER =       355
-
-ARCLEN =  2.09419078908685E+00
-NFE =  211
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.08944970126242E-08
-
-X( 1) = ( -9.09439085710027E+07,  4.88700931810435E+07)
-X( 2) = ( -2.40856436751465E+00,  3.22165965519084E-01)
-X( 3) = (  6.30360491003520E-01,  1.44286626664148E-03)
-X( 4) = (  8.60131014031318E+07, -4.52028350933974E+07)
-
-X( 5) = (  5.55692542054584E-09,  3.22760010000112E-09)
-
-PATH NUMBER =       356
-
-ARCLEN =  2.28627032458321E+00
-NFE =  374
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988730638752E-01
-
-X( 1) = ( -1.82618952116059E-01,  2.47435671276379E+00)
-X( 2) = ( -4.19477372851511E+00,  1.57098928309311E+00)
-X( 3) = (  5.20194883716666E-01, -1.58138379011952E-01)
-X( 4) = (  5.69084866457900E-01,  2.65719224892972E-01)
-
-X( 5) = (  2.25229316747828E-01,  1.10936331928922E-01)
-
-PATH NUMBER =       357
-
-ARCLEN =  1.99897950111202E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95491277923980E-01
-
-X( 1) = ( -8.15477441756844E-01,  1.18693286623322E+00)
-X( 2) = ( -9.71297688201276E-01, -7.59134377592301E-01)
-X( 3) = (  8.63091703261784E-01,  1.34642237502896E-02)
-X( 4) = ( -1.30333801176699E-01, -1.39611040543983E+00)
-
-X( 5) = (  1.69703997031649E-01,  4.86287513687397E-01)
-
-PATH NUMBER =       358
-
-ARCLEN =  1.57102929169509E+00
-NFE =  264
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991195506985E-01
-
-X( 1) = (  1.68910320119046E+00,  8.13920396003458E-01)
-X( 2) = (  5.56955912330582E-01,  5.04292881898094E-01)
-X( 3) = (  5.28108552661887E-01, -1.01006720784337E-02)
-X( 4) = ( -5.81110936734461E-01,  3.88117468851033E-01)
-
-X( 5) = ( -2.19225108834681E-01,  1.31578261073990E-01)
-
-PATH NUMBER =       359
-
-ARCLEN =  2.56488965315431E+00
-NFE =  214
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.18641910336014E-07
-
-X( 1) = ( -2.78529383693687E+06,  5.21487322700567E+05)
-X( 2) = (  6.94775590064760E-01, -4.61559549582679E-02)
-X( 3) = ( -1.98247866323250E+06, -1.74359164977641E+06)
-X( 4) = ( -8.87368343660938E-02,  3.18412029525656E-01)
-
-X( 5) = (  1.65422208310220E-07, -1.55566614874324E-09)
-
-PATH NUMBER =       360
-
-ARCLEN =  2.35598797087439E+00
-NFE =  220
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84306152876438E-01
-
-X( 1) = (  1.28673338859639E-01, -4.60961495934346E-01)
-X( 2) = (  8.41526819856768E-01,  6.80550373233807E-03)
-X( 3) = ( -9.91164971928405E-01, -6.87461060161660E-01)
-X( 4) = ( -6.63951265020748E-02, -2.76723901492845E-02)
-
-X( 5) = (  8.50944370068693E-01,  3.39811195714191E-02)
-
-PATH NUMBER =       361
-
-ARCLEN =  1.45736697248986E+00
-NFE =  270
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94411415738343E-01
-
-X( 1) = ( -2.40270834393077E-01, -1.63235899544416E-01)
-X( 2) = (  7.71061537645316E-01, -6.24268315536455E-02)
-X( 3) = ( -7.79516048266891E-01, -1.83456559768889E-01)
-X( 4) = (  7.10206141680771E-01, -3.75923949756005E-01)
-
-X( 5) = (  4.90668446336068E-01,  2.73121041546060E-01)
-
-PATH NUMBER =       362
-
-ARCLEN =  2.31947209430513E+00
-NFE =  258
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999998955E-01
-
-X( 1) = ( -5.82473947525044E+00,  3.69515245964569E+01)
-X( 2) = (  5.02936806653454E-01,  4.87337112384723E-01)
-X( 3) = (  4.98880174752215E-01, -1.91074889511406E-01)
-X( 4) = (  1.61195033614756E+01, -6.71018091461847E+01)
-
-X( 5) = (  6.09061866928870E-03,  1.38269192784747E-02)
-
-PATH NUMBER =       363
-
-ARCLEN =  1.55242100298467E+00
-NFE =  323
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99714700703564E-01
-
-X( 1) = ( -2.27310088038583E+00,  2.06688927789405E+00)
-X( 2) = ( -9.77136182580984E-01,  7.95500651981317E-01)
-X( 3) = (  8.89659917350745E-01,  2.33215909912087E-02)
-X( 4) = (  2.93460888914639E+00, -8.61905862914581E-01)
-
-X( 5) = (  1.47403632985482E-01,  1.36293794398801E-01)
-
-PATH NUMBER =       364
-
-ARCLEN =  2.40367019505864E+00
-NFE =  263
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999714E-01
-
-X( 1) = ( -3.45479207411766E+01,  7.27776563351177E+01)
-X( 2) = (  7.55224651495521E-02, -2.12533001744645E-01)
-X( 3) = (  9.40269733122990E-01,  9.74134117387381E-02)
-X( 4) = (  8.34161119241323E+01, -1.24993907114887E+02)
-
-X( 5) = (  4.94597531093813E-03,  5.45620580279646E-03)
-
-PATH NUMBER =       365
-
-ARCLEN =  2.69111434509031E+00
-NFE =  256
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.74953002838089E-07
-
-X( 1) = ( -8.19687102075436E+05,  7.94022236121795E+05)
-X( 2) = ( -1.06845046504518E+00,  2.88477612709450E-01)
-X( 3) = (  6.62918311870005E-01,  5.80289892436077E-02)
-X( 4) = (  1.64010643930561E+06, -1.26302602606400E+06)
-
-X( 5) = (  4.54672715386047E-07,  2.44392154219951E-07)
-
-PATH NUMBER =       366
-
-ARCLEN =  2.29798947994222E+00
-NFE =  227
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.83882296694196E-07
-
-X( 1) = ( -9.75661884368852E+05,  1.29987423918462E+06)
-X( 2) = ( -6.06114013453361E+05,  3.20724655893202E+05)
-X( 3) = (  9.67470985765375E-01,  2.37170952264480E-02)
-X( 4) = (  3.61425291043215E-02, -2.38144102150847E-02)
-
-X( 5) = (  2.26069038115456E-07,  3.51474536502971E-07)
-
-PATH NUMBER =       367
-
-ARCLEN =  2.44865435422443E+00
-NFE =  353
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84835805079839E-01
-
-X( 1) = (  9.59367184190299E-01, -2.91279281546545E-01)
-X( 2) = (  9.02896579101732E-01,  2.69537693450447E-01)
-X( 3) = ( -3.29024125265786E-01, -3.75665763579368E-01)
-X( 4) = ( -3.88113567185451E-01,  6.38504993006015E-01)
-
-X( 5) = ( -7.29291944889621E-01,  2.80446809500785E-01)
-
-PATH NUMBER =       368
-
-ARCLEN =  2.13474417355485E+00
-NFE =  396
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999270334E-01
-
-X( 1) = (  1.98736421337159E+00, -6.40491974704087E+00)
-X( 2) = (  4.95232132987793E-01,  4.60367914198877E-01)
-X( 3) = ( -1.35470166616241E+00, -9.04519235282506E+00)
-X( 4) = (  5.00919206247195E-01, -2.46374430309155E-01)
-
-X( 5) = (  9.86092137201652E-03, -4.80193338389888E-02)
-
-PATH NUMBER =       369
-
-ARCLEN =  2.22840131839391E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999674852E-01
-
-X( 1) = ( -6.92189344108060E+00, -6.73701276454933E+00)
-X( 2) = (  5.19730718726877E-01,  4.73731191872712E-01)
-X( 3) = ( -1.02724541017684E+01, -4.22352458858986E+00)
-X( 4) = (  5.27113869101674E-01, -2.12173945447951E-01)
-
-X( 5) = (  3.34854441314917E-02, -1.01001295328269E-02)
-
-PATH NUMBER =       370
-
-ARCLEN =  2.22441795325460E+00
-NFE =  521
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999182411682E-01
-
-X( 1) = (  3.29898670559013E-01, -2.84300541114283E-01)
-X( 2) = (  4.42554956056679E-01,  3.69904229621079E-01)
-X( 3) = ( -9.10397352537669E-01, -2.16932416927853E+00)
-X( 4) = (  1.45279751063135E+00, -3.68985011629146E-01)
-
-X( 5) = (  1.89441756251075E-01, -2.39388681173142E-01)
-
-PATH NUMBER =       371
-
-ARCLEN =  3.11151951306239E+00
-NFE =  288
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99964025827700E-01
-
-X( 1) = (  8.18551831813449E-01,  3.17788223032121E-01)
-X( 2) = ( -1.37662994509329E-01,  1.51803275006163E-01)
-X( 3) = ( -1.04378327688020E+00, -7.22808410746128E-01)
-X( 4) = (  7.14355435008062E-01, -1.05653344390710E-01)
-
-X( 5) = (  7.52898149610386E-01, -2.52527572922140E-01)
-
-PATH NUMBER =       372
-
-ARCLEN =  8.91560511819301E+00
-NFE =  541
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999964066286E-01
-
-X( 1) = ( -3.00938998195858E+00,  5.06425556349580E+00)
-X( 2) = (  4.46128258158107E-01, -4.71728290162300E-01)
-X( 3) = (  4.18637732931484E+00, -1.90452651628732E+00)
-X( 4) = (  5.03507027668698E-01,  1.80467743809549E-01)
-
-X( 5) = ( -8.77916968090410E-02,  1.00694819587708E-01)
-
-PATH NUMBER =       373
-
-ARCLEN =  1.48662555399517E+00
-NFE =  351
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98724841446735E-01
-
-X( 1) = (  1.49798861785342E-01,  1.13645460650674E+00)
-X( 2) = ( -4.07383442621785E-01,  9.48521526056585E-01)
-X( 3) = (  6.81406386482316E-01,  1.27626331179183E-01)
-X( 4) = (  6.60042464486062E-01, -6.75752634876010E-01)
-
-X( 5) = (  3.81366602738268E-02,  3.59101762972275E-01)
-
-PATH NUMBER =       374
-
-ARCLEN =  2.88226748834152E+00
-NFE =  211
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.88125978330764E-07
-
-X( 1) = (  3.67358306409351E+06,  4.05092205690916E+06)
-X( 2) = ( -3.26285864757516E+06,  3.15518873043220E+06)
-X( 3) = (  9.09179047055405E-01, -2.01598012574197E-04)
-X( 4) = (  7.97643375431406E-02, -3.33082093130745E-03)
-
-X( 5) = ( -1.07681321580999E-07,  2.40320041072946E-07)
-
-PATH NUMBER =       375
-
-ARCLEN =  1.54668022237198E+00
-NFE =  267
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999996748289E-01
-
-X( 1) = ( -2.12261527210909E+01,  7.55222399731446E+00)
-X( 2) = ( -1.98341409046313E+01,  3.22281091257001E+01)
-X( 3) = ( -1.23582021674955E-02, -1.85677110705697E-02)
-X( 4) = (  9.91192828942913E-01, -1.14668863385621E-02)
-
-X( 5) = (  1.17536449660705E-02,  6.46152233508013E-03)
-
-PATH NUMBER =       376
-
-ARCLEN =  5.09706773837215E+00
-NFE =  302
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999977E-01
-
-X( 1) = ( -1.28656658698661E+02,  8.66630444442065E+01)
-X( 2) = ( -1.61549503091084E+02, -6.23985493914368E+02)
-X( 3) = ( -1.55802863138572E-01, -1.20576456268737E-02)
-X( 4) = (  8.92319411558154E-01, -6.39706162964835E-04)
-
-X( 5) = ( -6.95263748947438E-04, -1.69608136795839E-03)
-
-PATH NUMBER =       377
-
-ARCLEN =  2.30009843808163E+00
-NFE =  401
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999991886308E-01
-
-X( 1) = (  1.34905951978347E+00, -3.05783975533577E+00)
-X( 2) = (  4.96214836856188E-01,  4.43851339839411E-01)
-X( 3) = ( -4.35925132638724E+00, -5.95642315857218E+00)
-X( 4) = (  5.04021261990456E-01, -2.76362800116803E-01)
-
-X( 5) = (  4.11091909788042E-02, -6.48955126911458E-02)
-
-PATH NUMBER =       378
-
-ARCLEN =  1.69258683631162E+00
-NFE =  199
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.80884516337079E-13
-
-X( 1) = ( -2.88305411348743E+11, -4.68617923857863E+10)
-X( 2) = (  5.19454628854071E-01,  2.76537979041754E-01)
-X( 3) = ( -2.18240024401352E+11,  2.30524405171125E+11)
-X( 4) = (  1.59289105934632E+11, -2.25403543454720E+11)
-
-X( 5) = (  9.67307072115287E-13,  4.70728165648249E-13)
-
-PATH NUMBER =       379
-
-ARCLEN =  3.35359746064207E+00
-NFE =  408
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.50088153382573E-06
-
-X( 1) = ( -4.55440171334399E-02,  1.62172779233788E-01)
-X( 2) = (  1.21277967883319E+00, -2.21804219766778E+00)
-X( 3) = (  3.99506400021913E+05, -2.91359664420981E+05)
-X( 4) = (  8.36642787160112E-01,  5.98138622726905E-02)
-
-X( 5) = ( -1.14837152048470E-06, -9.24719904659181E-07)
-
-PATH NUMBER =       380
-
-ARCLEN =  2.10113902249940E+00
-NFE =  255
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98167496754117E-01
-
-X( 1) = ( -1.08935945191861E-02,  2.09194797937351E-01)
-X( 2) = ( -2.50457430652405E-01,  7.01933456298339E-01)
-X( 3) = (  3.24047688392918E-01, -4.19026679519102E-01)
-X( 4) = (  9.91010184380144E-01, -8.58430538679847E-03)
-
-X( 5) = (  8.36889993937234E-01,  4.35271656072205E-01)
-
-PATH NUMBER =       381
-
-ARCLEN =  2.43455048429184E+00
-NFE =  301
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93084073481719E-01
-
-X( 1) = ( -1.25718773653443E-01,  4.01117446992341E-01)
-X( 2) = ( -1.00705555084578E+00,  4.29703640849720E-01)
-X( 3) = (  6.87118489561979E-01, -2.44412123907092E-01)
-X( 4) = (  6.60538430017942E-01,  8.11251075665166E-02)
-
-X( 5) = (  1.03867602498946E+00,  4.45564596484801E-01)
-
-PATH NUMBER =       382
-
-ARCLEN =  1.48841514384334E+00
-NFE =  306
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.85728464788242E-01
-
-X( 1) = ( -4.35219660304060E-01,  5.54796249823066E-01)
-X( 2) = ( -1.19238320954899E+00,  6.16840384347588E-01)
-X( 3) = (  5.86420575113797E-01,  2.28826280981157E-02)
-X( 4) = (  6.99106440090853E-01,  1.88779502291424E-02)
-
-X( 5) = (  4.22108161437684E-01,  2.95707014823041E-01)
-
-PATH NUMBER =       383
-
-ARCLEN =  2.74598482540610E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999996117E-01
-
-X( 1) = ( -1.33567417370384E+00, -4.66311280897903E+00)
-X( 2) = ( -8.99418450542653E+00, -7.85006169005839E+01)
-X( 3) = (  4.97087107198229E-01,  2.01129285298115E-01)
-X( 4) = (  5.17981628908030E-01, -2.57396701689876E-01)
-
-X( 5) = ( -5.23213722576597E-03, -9.23856582787713E-03)
-
-PATH NUMBER =       384
-
-ARCLEN =  1.44811935542790E+00
-NFE =  457
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99961648623122E-01
-
-X( 1) = ( -2.11561283088708E+00,  1.79094526200259E+00)
-X( 2) = ( -1.97537173904257E+00,  6.92260937772512E-01)
-X( 3) = (  6.42600301851364E-01,  2.57454558193578E-01)
-X( 4) = (  6.03020121556818E-01, -1.65324249095800E-01)
-
-X( 5) = (  1.42450161163161E-01,  1.32570187107301E-01)
-
-PATH NUMBER =       385
-
-ARCLEN =  2.05882410206214E+00
-NFE =  227
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.77415897432003E-07
-
-X( 1) = ( -1.36565206340089E+06, -6.60062248595245E+05)
-X( 2) = ( -8.30804533200199E-01, -1.20452566871530E-02)
-X( 3) = ( -2.04668183013072E+06, -4.55716084220430E+05)
-X( 4) = (  7.50105690094495E-01,  1.00193584532828E-02)
-
-X( 5) = (  2.00699500276067E-07, -2.29507161086159E-08)
-
-PATH NUMBER =       386
-
-ARCLEN =  2.15417555155253E+00
-NFE =  383
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99540476698200E-01
-
-X( 1) = (  2.06383892900576E-01, -2.75103130554967E-01)
-X( 2) = ( -5.19057051567178E-02,  3.50191253324489E-01)
-X( 3) = ( -9.29052398275569E-02, -4.49555421929111E-01)
-X( 4) = (  9.97898874381129E-01, -8.38600145571022E-04)
-
-X( 5) = (  8.07889697213223E-01, -3.26822000511017E-01)
-
-PATH NUMBER =       387
-
-ARCLEN =  1.46149328806056E+00
-NFE =  445
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96782322730878E-01
-
-X( 1) = ( -1.51065827948605E-01, -1.26705401980074E+00)
-X( 2) = ( -1.90605383508024E-03, -4.50288984121818E-02)
-X( 3) = ( -1.65809817491378E+00,  2.69192500379249E-01)
-X( 4) = (  9.97816170355987E-01,  6.85975726720718E-03)
-
-X( 5) = (  2.53198291847733E-01, -4.74059577120686E-02)
-
-PATH NUMBER =       388
-
-ARCLEN =  4.23275362642045E+00
-NFE =  393
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999958E-01
-
-X( 1) = (  9.74663153006621E-02, -1.59474763549707E-01)
-X( 2) = ( -2.74786798576898E+02, -2.85320797540582E+02)
-X( 3) = (  1.06489414426604E+00, -1.70325712508813E-01)
-X( 4) = (  4.70667814006731E+02,  3.89051840416896E+01)
-
-X( 5) = (  2.55478445752933E-04, -1.32883781180426E-03)
-
-PATH NUMBER =       389
-
-ARCLEN =  3.03447812540756E+00
-NFE =  318
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.52344081657047E-06
-
-X( 1) = (  9.12625748828047E-01,  1.73131074362262E-01)
-X( 2) = ( -9.85397363959080E-02, -3.84030591565535E-03)
-X( 3) = (  2.59476483091984E+05,  2.05184443258994E+05)
-X( 4) = (  7.00392204360266E-01, -4.90766191765610E-02)
-
-X( 5) = ( -1.79205757239211E-06,  1.28280815055577E-06)
-
-PATH NUMBER =       390
-
-ARCLEN =  2.98528308328748E+00
-NFE =  422
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99623627641124E-01
-
-X( 1) = (  3.66857141659197E-01,  6.14063255082783E-01)
-X( 2) = ( -5.75546359134265E-01,  6.87779731710858E-01)
-X( 3) = (  1.11686885680147E-01, -8.01005138748476E-01)
-X( 4) = (  9.02525168363120E-01, -4.57940675089209E-03)
-
-X( 5) = (  1.21952111665127E+00,  1.03441202786248E-01)
-
-PATH NUMBER =       391
-
-ARCLEN =  1.59157854264554E+00
-NFE =  277
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92925828729895E-01
-
-X( 1) = ( -5.18225990493904E-01,  6.43489539758471E-01)
-X( 2) = ( -1.45682406216568E+00,  8.44759580421920E-01)
-X( 3) = (  6.11648616015629E-01, -1.23419106345549E-01)
-X( 4) = (  7.92405443092705E-01,  2.20503840609789E-01)
-
-X( 5) = (  4.11044267165317E-01,  2.05380134338819E-01)
-
-PATH NUMBER =       392
-
-ARCLEN =  1.32228395141006E+00
-NFE =  418
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98123193201358E-01
-
-X( 1) = ( -1.05618482223819E+00,  7.17568932295446E-01)
-X( 2) = ( -2.14358298371648E+00,  1.70856423608552E+00)
-X( 3) = (  6.09095925245931E-01, -1.36639041080923E-01)
-X( 4) = (  6.69462823310170E-01,  2.72116518785528E-01)
-
-X( 5) = (  2.20969990654213E-01,  9.69593866203737E-02)
-
-PATH NUMBER =       393
-
-ARCLEN =  2.02238347737531E+00
-NFE =  353
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999969E-01
-
-X( 1) = ( -5.35347857525783E+01, -1.39717744042084E+02)
-X( 2) = ( -8.34528525312990E+02, -6.89511864826655E+02)
-X( 3) = (  1.05592371551513E-01, -1.27716425853758E-01)
-X( 4) = (  9.25727805196100E-01,  6.82941634466653E-02)
-
-X( 5) = (  1.83230985440357E-04, -6.66389097437474E-04)
-
-PATH NUMBER =       394
-
-ARCLEN =  2.18950043081326E+00
-NFE =  265
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.37383289604173E-08
-
-X( 1) = (  9.98515599220058E+05,  4.60668400732469E+06)
-X( 2) = ( -9.50988673842498E-01, -1.25596052860524E-01)
-X( 3) = (  9.25382026706303E+06, -5.29220578814059E+06)
-X( 4) = (  7.32358848096766E-01, -2.82099269652470E-03)
-
-X( 5) = ( -6.03535263759755E-08, -9.78315801601019E-09)
-
-PATH NUMBER =       395
-
-ARCLEN =  2.48724942493993E+00
-NFE =  232
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999653E-01
-
-X( 1) = ( -7.74301182499179E+01, -1.93327371895576E+02)
-X( 2) = ( -3.89178967866821E+02, -7.42176680725784E+01)
-X( 3) = (  3.98008343834378E-02, -2.12307623808768E-02)
-X( 4) = (  1.03948429294210E+00, -2.15379384270478E-02)
-
-X( 5) = (  8.89743604559875E-04, -9.90589248818707E-04)
-
-PATH NUMBER =       396
-
-ARCLEN =  3.88765801106933E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999976563336E-01
-
-X( 1) = (  9.81655996785211E+00, -4.05401805218792E+00)
-X( 2) = (  2.34199775637486E+00, -9.59883706564895E+00)
-X( 3) = (  4.40071825660175E-02,  5.36736280992831E-02)
-X( 4) = (  1.02959177263833E+00,  8.08107039179960E-02)
-
-X( 5) = ( -2.91335822213545E-02, -2.64654702875894E-02)
-
-PATH NUMBER =       397
-
-ARCLEN =  3.30476618101572E+00
-NFE =  328
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994828274464E-01
-
-X( 1) = (  5.66989220153931E-01,  6.86649944247515E-01)
-X( 2) = (  4.85259113481753E-01, -1.22744767649697E+00)
-X( 3) = ( -8.59649469132632E-01, -1.76847994232843E+00)
-X( 4) = (  5.62922426669566E-01, -8.92210310484546E-02)
-
-X( 5) = ( -1.29236264344664E-01, -4.79010182752766E-01)
-
-PATH NUMBER =       398
-
-ARCLEN =  2.17682099209264E+00
-NFE =  335
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99928556910032E-01
-
-X( 1) = (  6.61156741691181E-01, -1.26336466464626E-01)
-X( 2) = (  1.46209323533091E-01,  4.27357657304068E-01)
-X( 3) = ( -1.29025410750803E+00,  5.46443642711119E-01)
-X( 4) = (  1.65149728286147E+00, -4.97912319680532E-01)
-
-X( 5) = (  3.70896637930714E-01,  1.52954685548123E-01)
-
-PATH NUMBER =       399
-
-ARCLEN =  3.38125826842660E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99840345707805E-01
-
-X( 1) = (  5.36848664647975E-01,  1.95763872629027E-01)
-X( 2) = ( -3.05072192446427E-01,  7.79075036817780E-01)
-X( 3) = ( -3.06687659068400E-02, -2.86374057924171E-01)
-X( 4) = (  9.76127139443048E-01,  1.95763325816638E-02)
-
-X( 5) = (  9.79549785517358E-01,  4.78169842036779E-01)
-
-PATH NUMBER =       400
-
-ARCLEN =  6.27795775837315E+00
-NFE =  471
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99560085417113E-01
-
-X( 1) = (  6.77997516791923E-01,  9.41667346773246E-01)
-X( 2) = ( -1.05068530849134E+00,  5.43147084256368E-01)
-X( 3) = (  8.09209066903768E-01, -9.74721186500729E-03)
-X( 4) = (  1.72023258832641E-01,  6.23477931769312E-02)
-
-X( 5) = ( -3.42643374362469E-01,  6.23203809500669E-01)
-
-PATH NUMBER =       401
-
-ARCLEN =  4.94711599129494E+00
-NFE =  327
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99731023177926E-01
-
-X( 1) = (  4.16336573943931E-01,  1.24182506517787E+00)
-X( 2) = ( -1.68132598972905E+00,  1.92988620916656E+00)
-X( 3) = (  5.74170409354651E-01, -9.35641501601920E-02)
-X( 4) = (  5.53140405711332E-01,  4.68681865446657E-01)
-
-X( 5) = (  2.10138151183783E-01,  3.41326126340574E-01)
-
-PATH NUMBER =       402
-
-ARCLEN =  4.20278348921162E+00
-NFE =  244
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999809E-01
-
-X( 1) = ( -3.05140620481597E-01,  1.13685299672351E-01)
-X( 2) = ( -3.94696979610089E+02,  2.68692688946453E+02)
-X( 3) = (  8.76221814053364E-01, -8.04114249874651E-03)
-X( 4) = ( -4.08909088575721E+01, -3.51710090413631E+01)
-
-X( 5) = (  1.76504290021340E-03, -6.33141110233561E-05)
-
-PATH NUMBER =       403
-
-ARCLEN =  2.04850875375491E+00
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99955118100351E-01
-
-X( 1) = (  7.68265471418950E-01, -1.42762097874210E-01)
-X( 2) = ( -1.93104199865690E-01,  7.81770187216679E-02)
-X( 3) = ( -1.22304466238823E+00, -6.02451372087130E-01)
-X( 4) = (  8.84358007907155E-01,  2.35233206947866E-01)
-
-X( 5) = (  4.31937246355129E-01, -2.86128583914153E-01)
-
-PATH NUMBER =       404
-
-ARCLEN =  1.89899534603337E+00
-NFE =  173
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.50558265133751E-12
-
-X( 1) = (  1.86133282203925E+10,  5.07690738557662E+09)
-X( 2) = (  1.02355224971164E+11,  3.20623101342043E+10)
-X( 3) = (  1.21874359024192E+10, -2.16016236705796E+10)
-X( 4) = (  4.91353449623970E-01, -1.19570357356665E-03)
-
-X( 5) = ( -6.39495170685032E-12,  4.14681418543783E-12)
-
-PATH NUMBER =       405
-
-ARCLEN =  2.85198889537271E+00
-NFE =  313
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999997919931E-01
-
-X( 1) = (  4.97080853729031E-01,  2.08468697475003E-01)
-X( 2) = (  8.37352970758415E+00, -1.67415417087057E+01)
-X( 3) = ( -4.94439285655445E+00, -9.73337230330266E+00)
-X( 4) = (  5.05148069342215E-01, -2.57727174513678E-01)
-
-X( 5) = ( -2.08271890662679E-02, -3.46493539092675E-02)
-
-PATH NUMBER =       406
-
-ARCLEN =  3.80246557030755E+00
-NFE =  340
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999980E-01
-
-X( 1) = (  9.33506865599912E-01, -2.45806826056928E-02)
-X( 2) = ( -9.52901383223094E+02, -5.89057281895663E+02)
-X( 3) = ( -6.95920967978619E-02, -2.40840508265435E-02)
-X( 4) = ( -3.15809907886376E+02, -5.06945489488558E+01)
-
-X( 5) = (  2.86427341664643E-04, -8.42013818899724E-04)
-
-PATH NUMBER =       407
-
-ARCLEN =  4.06224906107220E+00
-NFE =  326
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999951E-01
-
-X( 1) = (  9.04982673276133E-01, -4.34822770007344E-03)
-X( 2) = ( -4.36781653462631E+02,  2.04643655261735E+02)
-X( 3) = ( -3.69631182842125E+01,  4.74497043116533E+01)
-X( 4) = (  2.89498630498953E-02, -2.54444359613622E-02)
-
-X( 5) = (  1.65369874410286E-03, -2.06707481616550E-04)
-
-PATH NUMBER =       408
-
-ARCLEN =  4.82985118312192E+00
-NFE =  288
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999938E-01
-
-X( 1) = (  3.52594951445127E-01,  7.32687451565424E-02)
-X( 2) = (  6.30192029499280E+02, -1.19387217670015E+03)
-X( 3) = (  1.12116342304897E+00, -4.63912498428058E-01)
-X( 4) = (  2.29328823295622E+02,  2.84937486314535E+02)
-
-X( 5) = ( -5.06275475937929E-04, -2.62345709071521E-04)
-
-PATH NUMBER =       409
-
-ARCLEN =  2.14573310712917E+01
-NFE =  446
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99946817087533E-01
-
-X( 1) = (  1.20949049345988E+00,  7.15604912770964E-01)
-X( 2) = ( -6.72139762544201E-01,  1.84163140451087E-01)
-X( 3) = (  8.33127916741490E-01, -5.14054283817679E-02)
-X( 4) = (  7.46018332617922E-02, -8.25445206002933E-02)
-
-X( 5) = ( -4.90200589376252E-01,  1.74353957323107E-01)
-
-PATH NUMBER =       410
-
-ARCLEN =  3.10747871739768E+01
-NFE =  553
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999292535E-01
-
-X( 1) = ( -7.57470001180884E+00,  1.56871337426697E+01)
-X( 2) = ( -3.07047335831750E+01, -1.92417986983325E+01)
-X( 3) = (  5.11447762805559E-01, -2.34657858715057E-01)
-X( 4) = (  5.19298588958466E-01,  2.36984408684173E-01)
-
-X( 5) = (  3.03334062854838E-02, -3.54377359393440E-02)
-
-PATH NUMBER =       411
-
-ARCLEN =  8.76589358639981E+00
-NFE =  267
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999996E-01
-
-X( 1) = ( -1.04567231865814E+00,  1.03667518051165E+00)
-X( 2) = (  1.05892669940501E+02, -2.31212203186195E+02)
-X( 3) = (  8.66391572491576E-01, -4.70778286518474E-03)
-X( 4) = ( -1.97168249686102E-01, -2.07260496681426E-01)
-
-X( 5) = ( -3.04006190626034E-03, -1.43422514671805E-03)
-
-PATH NUMBER =       412
-
-ARCLEN =  2.49518381827297E+00
-NFE =  218
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.34792672711095E-07
-
-X( 1) = (  4.84250318886600E+05,  4.75576895867855E+05)
-X( 2) = ( -2.92751801319696E+06,  4.63681934846288E+06)
-X( 3) = (  1.67733752838319E-01, -2.11350582696212E-01)
-X( 4) = (  2.14595302543040E+00,  7.13487902165425E-01)
-
-X( 5) = (  1.59111016764937E-07,  7.06080994272761E-08)
-
-PATH NUMBER =       413
-
-ARCLEN =  2.00527963740976E+00
-NFE =  193
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.15441602417916E-06
-
-X( 1) = ( -2.46934327840738E+05,  1.55316622302161E+05)
-X( 2) = ( -7.75634771296641E+05,  1.77599930150046E+06)
-X( 3) = ( -6.73855496342129E-01,  8.10011990636710E-01)
-X( 4) = ( -2.80359391321029E+00, -2.53034386228566E+00)
-
-X( 5) = (  3.25297951621676E-07,  1.95680912549632E-07)
-
-PATH NUMBER =       414
-
-ARCLEN =  2.77806834680857E+00
-NFE =  245
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.34449159013952E-06
-
-X( 1) = (  8.78826031126848E-01,  1.93644571370748E-01)
-X( 2) = ( -1.86947866340918E-01, -1.90237397817445E-03)
-X( 3) = (  3.03629411221966E+04, -2.42562954839690E+04)
-X( 4) = (  8.86747251523874E-01, -2.05790975766948E-01)
-
-X( 5) = ( -1.40805043326303E-05, -1.23960675521186E-05)
-
-PATH NUMBER =       415
-
-ARCLEN =  2.49750186208109E+00
-NFE =  239
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.70820356555729E-01
-
-X( 1) = (  8.77779850921507E-01,  9.06081620882404E-03)
-X( 2) = (  2.53415650102114E-01, -1.43904355802266E-01)
-X( 3) = ( -3.81581831378338E-01, -9.10816947551833E-01)
-X( 4) = ( -4.44031480453794E-01, -1.01543252076444E-02)
-
-X( 5) = ( -9.89771137766720E-01, -9.19536128758333E-01)
-
-PATH NUMBER =       416
-
-ARCLEN =  2.72447905035370E+00
-NFE =  454
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999416288913E-01
-
-X( 1) = (  9.70828883168579E-01,  3.32414326613872E-02)
-X( 2) = (  7.85266066278451E-02, -1.06697082057794E-01)
-X( 3) = ( -9.55130002362040E-01, -2.64565320650112E+00)
-X( 4) = (  4.97148009306798E-01, -2.66737899317647E-01)
-
-X( 5) = (  6.59680122902004E-02, -2.78893030494907E-01)
-
-PATH NUMBER =       417
-
-ARCLEN =  3.30296543992863E+00
-NFE =  358
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95330588516038E-01
-
-X( 1) = (  1.02277583526220E+00,  9.86908198324150E-03)
-X( 2) = (  2.23971826341319E-01,  1.04916425814046E-01)
-X( 3) = ( -8.98401268800826E-01, -1.12699438885429E+00)
-X( 4) = (  5.23948953983117E-02,  3.55363858564888E-01)
-
-X( 5) = (  1.43585343552237E-01, -9.72732725276293E-01)
-
-PATH NUMBER =       418
-
-ARCLEN =  8.78766617778781E+00
-NFE =  262
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.98997263589613E-12
-
-X( 1) = ( -4.75341563970964E+11,  4.22208925823582E+10)
-X( 2) = (  4.71885093541944E+10, -3.48210190739950E+11)
-X( 3) = (  2.63275310663721E+11,  2.64831283891584E+11)
-X( 4) = (  4.98332312267741E-01,  2.54289103601682E-04)
-
-X( 5) = ( -6.78431757387271E-13,  2.42164562057681E-12)
-
-PATH NUMBER =       419
-
-ARCLEN =  2.80842124720164E+01
-NFE =  333
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.26136291208415E-12
-
-X( 1) = (  3.55762481294528E+11,  3.06572445138862E+12)
-X( 2) = ( -3.25406221688959E+12,  5.05056569826346E+11)
-X( 3) = (  1.66462882332532E+12, -1.10302303295647E+12)
-X( 4) = (  4.87091568530120E-01,  7.31556057237704E-02)
-
-X( 5) = ( -9.63221039387840E-13,  5.24924071224064E-14)
-
-PATH NUMBER =       420
-
-ARCLEN =  1.05511868667178E+01
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999898E-01
-
-X( 1) = ( -1.80961330085353E+00, -7.58675852661669E-01)
-X( 2) = ( -1.47278206658465E+03,  1.11578286373704E+01)
-X( 3) = (  6.34597688931609E-01, -6.78955699011100E-02)
-X( 4) = (  1.90590087591317E+02, -3.68554917457069E+02)
-
-X( 5) = (  4.26309382617200E-04, -2.93537605495694E-04)
-
-PATH NUMBER =       421
-
-ARCLEN =  1.08553358699159E+01
-NFE =  275
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.71146208692176E-01
-
-X( 1) = ( -8.19378085523486E-01,  5.25383272465447E-01)
-X( 2) = ( -1.64893857057621E+00, -1.76165586260712E+00)
-X( 3) = (  7.78738593660354E-01, -6.87049560192992E-03)
-X( 4) = ( -8.77890261269314E-01, -6.61684862626788E-01)
-
-X( 5) = (  1.87704783384163E+00, -1.09816754434622E+00)
-
-PATH NUMBER =       422
-
-ARCLEN =  2.56719071386781E+00
-NFE =  161
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.77843782922040E-13
-
-X( 1) = (  4.75200673421920E-01, -1.68696929916899E-02)
-X( 2) = ( -4.05907093598466E+12,  4.41957903265474E+11)
-X( 3) = ( -1.27818800476870E+11, -8.84033390158683E+11)
-X( 4) = ( -1.01018753431106E+12,  1.04885609980804E+12)
-
-X( 5) = (  1.39171931357734E-13, -1.46664202050478E-13)
-
-PATH NUMBER =       423
-
-ARCLEN =  2.37925047660320E+00
-NFE =  264
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999978E-01
-
-X( 1) = (  8.93840375064075E-01, -1.10000844172984E-03)
-X( 2) = ( -1.13695476741022E+03, -1.11452508510093E+03)
-X( 3) = (  6.92358927491221E+02,  1.30906858538343E+02)
-X( 4) = ( -1.33229081943119E-01, -2.05451720687211E-02)
-
-X( 5) = ( -2.14546501416404E-04, -4.84308739338859E-04)
-
-PATH NUMBER =       424
-
-ARCLEN =  3.51044100271096E+00
-NFE =  351
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84538530211356E-01
-
-X( 1) = (  5.96112198916792E-01, -1.69851115992345E-01)
-X( 2) = (  7.47797011876827E-01, -6.76511081882395E-02)
-X( 3) = ( -6.55843130208097E-01, -1.11866848928801E+00)
-X( 4) = ( -2.57726733146564E-01,  1.05166333395739E-01)
-
-X( 5) = ( -3.46215385029578E-01, -1.81976199669348E+00)
-
-PATH NUMBER =       425
-
-ARCLEN =  2.97489227038977E+00
-NFE =  146
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.98114145243099E-11
-
-X( 1) = (  1.19642688319941E+10, -1.17013895931212E+10)
-X( 2) = (  4.96130476410533E-01, -2.84767788012122E-01)
-X( 3) = ( -2.10559993956917E+10, -1.01445705309690E+09)
-X( 4) = ( -7.74837955577430E+09,  4.79472158780695E+09)
-
-X( 5) = (  2.66384711869200E-11, -3.13932640191687E-11)
-
-PATH NUMBER =       426
-
-ARCLEN =  5.01850287101003E+00
-NFE =  297
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.07388520432156E-10
-
-X( 1) = (  2.05652127314240E+09,  5.95704255575354E+09)
-X( 2) = (  5.34091178012324E-01, -2.13673819790982E-01)
-X( 3) = (  1.35279307592897E+09, -5.35526900341936E+09)
-X( 4) = (  3.82347042497346E+08, -2.13812869384457E+09)
-
-X( 5) = ( -1.60485702743567E-10, -1.83508940465246E-11)
-
-PATH NUMBER =       427
-
-ARCLEN =  5.99346720659335E+00
-NFE =  360
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.25416625910444E-11
-
-X( 1) = (  5.31594811460264E+10, -3.11815967251360E+11)
-X( 2) = (  4.03437615110560E+10,  1.17352368828175E+11)
-X( 3) = ( -2.57192233746454E+11,  2.05148192584810E+11)
-X( 4) = (  4.27735592659375E-01,  1.06084651342830E-01)
-
-X( 5) = (  2.01237125379249E-12,  5.10725359573194E-14)
-
-PATH NUMBER =       428
-
-ARCLEN =  6.90892364987943E+00
-NFE =  483
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999687E-01
-
-X( 1) = (  3.45723545501056E+00, -3.99979119417642E+00)
-X( 2) = (  2.94211031056494E+01, -1.04307074122954E+02)
-X( 3) = (  4.83462145405584E-01, -2.61114035217722E-01)
-X( 4) = (  4.76224444354883E-01,  2.10592465603889E-01)
-
-X( 5) = ( -6.04271067668322E-03, -4.46043832756739E-03)
-
-PATH NUMBER =       429
-
-ARCLEN =  1.01485065629420E+01
-NFE =  257
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.66240080889304E-01
-
-X( 1) = ( -8.73346541789773E-01,  5.64774127314772E-01)
-X( 2) = ( -1.49470318811625E+00, -1.26529922321922E+00)
-X( 3) = (  8.83301466372356E-01, -2.03052692988568E-02)
-X( 4) = ( -8.29729433806860E-01, -1.91745435114443E-01)
-
-X( 5) = (  2.07703196379279E+00,  1.65208695700978E+00)
-
-PATH NUMBER =       430
-
-ARCLEN =  1.65807337544049E+01
-NFE =  430
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99439320075759E-01
-
-X( 1) = ( -5.65706813738981E-01, -6.17668797994295E-01)
-X( 2) = (  9.63184777289475E-01, -8.74832026008386E-01)
-X( 3) = (  3.34899527328040E-01,  1.84594362141628E-02)
-X( 4) = (  1.27991558185622E+00, -3.88381872665750E-01)
-
-X( 5) = (  1.12646715921344E+00, -4.39845424433507E+00)
-
-PATH NUMBER =       431
-
-ARCLEN =  9.97353565096319E+00
-NFE =  438
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999986741081E-01
-
-X( 1) = (  1.54561369850903E-02, -2.60469088688123E-02)
-X( 2) = (  2.65612515324078E+01, -6.36567094589687E+00)
-X( 3) = (  1.02141929506972E+00, -2.81741865553147E-02)
-X( 4) = (  1.20104469637386E+01, -1.21978845981011E+01)
-
-X( 5) = ( -3.71337868153985E-02,  2.18151268089295E-02)
-
-PATH NUMBER =       432
-
-ARCLEN =  4.57798682009200E+00
-NFE =  251
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999893E-01
-
-X( 1) = (  9.01672864165797E-01, -1.26503151838019E-02)
-X( 2) = ( -2.85671217432355E+02, -5.34936648409464E+02)
-X( 3) = (  7.76672132459200E+01, -1.28687614700922E+01)
-X( 4) = (  3.59301307213197E-02, -1.33259385693147E-01)
-
-X( 5) = ( -4.28139506201603E-04, -1.24030698007145E-03)
-
-PATH NUMBER =       433
-
-ARCLEN =  4.68879483964952E+01
-NFE =  346
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.76892811477428E-01
-
-X( 1) = (  2.78331016964558E-01, -1.42182120661818E-01)
-X( 2) = (  7.38633638812262E-01,  1.69556145614241E-02)
-X( 3) = ( -4.80486985991044E-01, -9.69239924444049E-01)
-X( 4) = ( -1.89460483798712E-02, -1.03426484888101E-01)
-
-X( 5) = (  2.95089687737825E+00, -1.34173781198757E+00)
-
-PATH NUMBER =       434
-
-ARCLEN =  8.44783324777426E+00
-NFE =  242
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.22004208276780E-10
-
-X( 1) = ( -1.63854055646813E+09,  4.67470812632920E+09)
-X( 2) = (  5.10101305227441E-01,  2.83836501742894E-01)
-X( 3) = (  5.42819885426774E+09, -3.52424875828570E+09)
-X( 4) = (  3.13092552020200E+09, -4.03105978223033E+09)
-
-X( 5) = ( -2.01542396216069E-10,  4.32006357227975E-11)
-
-PATH NUMBER =       435
-
-ARCLEN =  4.92280072924459E+00
-NFE =  409
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999098361390E-01
-
-X( 1) = ( -2.45940778772088E+00, -9.80170624006723E-01)
-X( 2) = ( -3.08234202232370E-01, -5.79361546385002E-02)
-X( 3) = (  2.19574617344815E+00,  8.93447847453608E-01)
-X( 4) = (  8.79153387249150E-01, -6.16935154502097E-03)
-
-X( 5) = (  3.67271310542377E-01,  3.36164108565546E-01)
-
-PATH NUMBER =       436
-
-ARCLEN =  2.74754917845119E+00
-NFE =  428
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99670222824472E-01
-
-X( 1) = ( -1.40578414369404E+00,  4.50628524971054E-01)
-X( 2) = ( -4.09994062237465E-01, -2.02397404620661E-01)
-X( 3) = (  8.67348041521432E-01,  1.55455373133242E-01)
-X( 4) = (  8.02013598799750E-01, -1.69052824684282E-01)
-
-X( 5) = (  3.22915599808938E-01,  3.84591426151804E-01)
-
-PATH NUMBER =       437
-
-ARCLEN =  4.60488343969631E+00
-NFE =  412
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999948119464E-01
-
-X( 1) = ( -2.35161921564809E+00,  3.42741076072376E+00)
-X( 2) = ( -4.98409320114656E-01, -2.12964967018480E-01)
-X( 3) = (  7.68586239381447E-01, -1.54407453267328E-01)
-X( 4) = (  6.75732088196138E-01,  1.48104456227310E-01)
-
-X( 5) = (  2.94263659671730E-02,  1.84603235164256E-01)
-
-PATH NUMBER =       438
-
-ARCLEN =  6.01301493395748E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999841257625E-01
-
-X( 1) = ( -9.32636637546419E+00,  1.57835931215048E-01)
-X( 2) = ( -5.12565657528468E+00,  3.33789182025179E+00)
-X( 3) = (  1.00357206601963E+00,  1.07408868179069E-02)
-X( 4) = (  2.60610996631303E-03,  1.43867085371145E-02)
-
-X( 5) = (  5.13710709735216E-02,  1.55313238989499E-02)
-
-PATH NUMBER =       439
-
-ARCLEN =  1.10031778991731E+01
-NFE =  187
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.16832378722233E-12
-
-X( 1) = ( -6.32591632115188E+10, -6.06836451302436E+10)
-X( 2) = (  3.11090629467498E+10, -9.15673516553352E+10)
-X( 3) = (  5.04950278965599E-01, -1.93887616782174E-02)
-X( 4) = ( -1.21160192332773E+10, -2.56456838804841E+10)
-
-X( 5) = (  3.22120124627776E-12, -1.04527544931253E-11)
-
-PATH NUMBER =       440
-
-ARCLEN =  5.01441976735736E+02
-NFE =  758
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.83428163879838E-12
-
-X( 1) = (  5.00914881032970E-01,  2.17621187555523E-03)
-X( 2) = ( -7.50373259008211E+10,  9.44204655192333E+10)
-X( 3) = ( -2.22435176166116E+11, -3.51747969073038E+10)
-X( 4) = ( -6.46022259590409E+10,  1.80356333628615E+11)
-
-X( 5) = (  3.00303212201827E-12, -1.66690771429001E-13)
-
-PATH NUMBER =       441
-
-ARCLEN =  1.55444732518083E+02
-NFE =  581
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999844024857E-01
-
-X( 1) = ( -1.67412545245634E-01, -1.37301063210412E-01)
-X( 2) = (  1.05727899940830E+00, -2.59107488019773E-01)
-X( 3) = (  5.34177724922320E-01,  2.01752621923349E-01)
-X( 4) = (  4.50019794706970E-01,  2.40739293869554E+00)
-
-X( 5) = ( -3.89915628259870E-01,  1.21172478066940E-01)
-
-PATH NUMBER =       442
-
-ARCLEN =  5.20146719711117E+00
-NFE =  394
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87495603172168E-01
-
-X( 1) = ( -1.43299089479750E-02, -2.85234174843118E-01)
-X( 2) = (  7.59824220404844E-01,  4.27891123298957E-02)
-X( 3) = ( -4.65207087074934E-01, -5.39232018989553E-01)
-X( 4) = (  3.48772370151936E-01, -2.37073100204262E-01)
-
-X( 5) = (  1.02928736010475E+00,  3.89662549609081E-01)
-
-PATH NUMBER =       443
-
-ARCLEN =  1.13988552825532E+01
-NFE =  287
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.28164130331485E-09
-
-X( 1) = (  9.56335540107064E+07,  6.30965007865107E+07)
-X( 2) = ( -1.09711329405541E+00, -3.28634710819555E-03)
-X( 3) = ( -3.72867582600019E+07, -1.70092924287487E+08)
-X( 4) = (  7.27938581131989E-01,  2.88794668283623E-02)
-
-X( 5) = ( -1.84654918393141E-09, -4.05311372425653E-09)
-
-PATH NUMBER =       444
-
-ARCLEN =  2.34247618824809E+00
-NFE =  304
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.85638383850218E-01
-
-X( 1) = ( -9.23065104030230E-01,  6.53196480367913E-01)
-X( 2) = ( -6.74884385000498E-01,  2.66834098351590E-01)
-X( 3) = (  9.62915348865888E-01,  1.73375943256539E-02)
-X( 4) = (  7.95745158612826E-01, -1.37243802946874E-01)
-
-X( 5) = (  2.98742784521787E-01,  4.53946758867425E-01)
-
-PATH NUMBER =       445
-
-ARCLEN =  6.00379674449142E+00
-NFE =  454
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999974E-01
-
-X( 1) = ( -2.85314248699184E-02, -1.33631443500952E-01)
-X( 2) = (  2.32103884113489E+02, -2.86728337605208E+02)
-X( 3) = (  9.77463587115930E-01, -1.14641650921456E-01)
-X( 4) = (  9.32194920473485E+00,  4.65085683336361E+02)
-
-X( 5) = ( -1.35042307649952E-03, -4.32271197489973E-04)
-
-PATH NUMBER =       446
-
-ARCLEN =  1.18757242938772E+01
-NFE =  522
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99407569802079E-01
-
-X( 1) = ( -9.64112424644307E-01,  2.36486428336652E-02)
-X( 2) = (  1.34628626990657E-01, -1.04926182578749E+00)
-X( 3) = (  9.33354346430143E-01,  4.78338964075514E-02)
-X( 4) = (  1.26718674738105E+00, -7.84420733432226E-01)
-
-X( 5) = (  3.17687936848830E+00,  2.32484779149703E+00)
-
-PATH NUMBER =       447
-
-ARCLEN =  1.80266007669171E+00
-NFE =  442
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99976188472875E-01
-
-X( 1) = ( -2.20311378063905E+00,  7.74838782224388E-01)
-X( 2) = ( -5.99864474511019E-01,  7.86991821215116E-01)
-X( 3) = (  6.34269516581185E-01, -1.11163296050593E-01)
-X( 4) = (  7.42201801844541E-01,  3.07076742489962E-01)
-
-X( 5) = (  1.84624605378247E-01,  1.60611180947056E-01)
-
-PATH NUMBER =       448
-
-ARCLEN =  4.19554665799391E+00
-NFE =  351
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99964382515031E-01
-
-X( 1) = ( -5.20377317156735E-01, -9.53475697096738E-01)
-X( 2) = (  5.86396297335641E-01, -5.58519336506923E-01)
-X( 3) = (  4.28310093879133E-01,  1.64084577062697E-01)
-X( 4) = (  1.65781478506418E+00,  9.14806607111826E-01)
-
-X( 5) = (  2.88275471748708E-02, -9.83161028264452E-01)
-
-PATH NUMBER =       449
-
-ARCLEN =  7.38589591819762E+00
-NFE =  216
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.87852761540567E-09
-
-X( 1) = (  3.08936863516621E+07, -2.17698892601280E+07)
-X( 2) = (  4.83663510981132E-01, -3.04394382679846E-01)
-X( 3) = (  6.08871558936636E+07, -2.14676547298801E+07)
-X( 4) = (  1.48608956569262E+07, -2.03391753694502E+07)
-
-X( 5) = ( -6.14406061653070E-09, -5.25976366578867E-09)
-
-PATH NUMBER =       450
-
-ARCLEN =  5.91942564444387E+01
-NFE =  339
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.07870108840178E-06
-
-X( 1) = ( -3.90562702841287E-01, -3.81644640196523E-02)
-X( 2) = (  7.53499122451906E-01, -1.76151910668245E-01)
-X( 3) = (  2.94681517659385E+05, -4.78459638250282E+04)
-X( 4) = (  1.40551856163687E+05, -6.93221103756395E+04)
-
-X( 5) = ( -2.58353989571414E-06, -1.12082290293412E-06)
-
-PATH NUMBER =       451
-
-ARCLEN =  3.29883841556252E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994670355206E-01
-
-X( 1) = (  5.50969950163796E-01, -9.61495909168464E-01)
-X( 2) = ( -2.84299239318650E-04,  1.08437779568417E-01)
-X( 3) = (  7.95233071881895E-01, -1.25187958672861E+00)
-X( 4) = (  1.03881295887951E+00, -2.25765651035787E-02)
-
-X( 5) = ( -4.37652206543640E-02, -3.46772807414626E-01)
-
-PATH NUMBER =       452
-
-ARCLEN =  3.91352478502857E+00
-NFE =  274
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96768884415375E-01
-
-X( 1) = ( -4.96828917720478E-01,  5.31559916335794E-01)
-X( 2) = ( -3.64378229349259E-01,  3.22403464193239E-01)
-X( 3) = (  1.00551672115462E+00, -2.10732069845279E-01)
-X( 4) = (  9.89377471880463E-01, -2.79758630831882E-01)
-
-X( 5) = (  3.09874837554489E-01,  8.37588007231351E-01)
-
-PATH NUMBER =       453
-
-ARCLEN =  4.69475359134198E+00
-NFE =  463
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97918758595051E-01
-
-X( 1) = ( -3.64243713740967E-01,  1.18320360534591E+00)
-X( 2) = ( -9.71817522021370E-01,  6.91010001108956E-01)
-X( 3) = (  1.03970260038843E+00, -1.00999757188199E+00)
-X( 4) = (  7.44109424642709E-01,  3.95819725392910E-02)
-
-X( 5) = (  7.65537113805345E-01,  1.04745187290442E+00)
-
-PATH NUMBER =       454
-
-ARCLEN =  3.26126768685509E+00
-NFE =  476
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999966237773E-01
-
-X( 1) = ( -3.57105611921501E+00,  1.94900864137181E+00)
-X( 2) = (  5.68530909960463E-03,  1.47800290985817E-01)
-X( 3) = (  8.86588576255864E-01, -5.66247626391451E-01)
-X( 4) = (  9.27644239138608E-01,  4.78347671207578E-02)
-
-X( 5) = (  1.15301505009744E-01,  1.58648213179316E-01)
-
-PATH NUMBER =       455
-
-ARCLEN =  4.31847991104922E+00
-NFE =  371
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99887978325627E-01
-
-X( 1) = ( -7.67322067298076E-01, -2.42117562470248E-01)
-X( 2) = ( -2.75222474083308E-01, -5.40403882647508E-01)
-X( 3) = (  8.92277080078058E-01,  4.84507831295024E-02)
-X( 4) = (  1.70505577621274E+00,  6.00940180575283E-02)
-
-X( 5) = (  8.35795907898234E-01, -8.61726623585276E-01)
-
-PATH NUMBER =       456
-
-ARCLEN =  2.17937544004187E+00
-NFE =  560
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998349003018E-01
-
-X( 1) = ( -9.32303835205466E-01,  1.22544368145590E+00)
-X( 2) = (  1.84767025366997E+00,  4.45779799933112E+00)
-X( 3) = (  5.17497961606192E-01, -1.34620795671531E-01)
-X( 4) = (  5.83232440225597E-01,  3.23200307910938E-01)
-
-X( 5) = (  2.95472450229366E-02,  1.21777226510701E-01)
-
-PATH NUMBER =       457
-
-ARCLEN =  1.92755287939682E+00
-NFE =  407
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991711201554E-01
-
-X( 1) = ( -2.15663081277011E+00, -1.83430559986616E+00)
-X( 2) = ( -3.39820057005572E+00, -1.59728349803696E+00)
-X( 3) = (  5.72209240114700E-01,  1.82237088751221E-01)
-X( 4) = (  6.06319727273067E-01, -2.71909074564735E-01)
-
-X( 5) = (  1.13627684517622E-01, -8.68294100534060E-02)
-
-PATH NUMBER =       458
-
-ARCLEN =  3.44652111011843E+00
-NFE =  532
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997651150547E-01
-
-X( 1) = (  2.01352014199408E+00, -1.59021322974569E+00)
-X( 2) = (  1.07579179393762E+00, -6.30735361403613E-02)
-X( 3) = ( -1.97836594198792E-02,  1.74318044834328E-02)
-X( 4) = ( -1.39541235553962E-01,  1.43266606222266E+00)
-
-X( 5) = ( -2.47550422684798E-01, -1.44574855128905E-01)
-
-PATH NUMBER =       459
-
-ARCLEN =  3.29485965119441E+00
-NFE =  274
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99980332215672E-01
-
-X( 1) = (  3.01399935673581E-01, -7.50296324675136E-01)
-X( 2) = ( -1.62139424513928E-01, -1.71418967572402E-01)
-X( 3) = (  8.57189786126918E-01, -8.61682360647549E-01)
-X( 4) = (  1.10816350297593E+00, -7.54118045574296E-03)
-
-X( 5) = ( -5.92015299921815E-02, -4.22861346204265E-01)
-
-PATH NUMBER =       460
-
-ARCLEN =  2.26980613009488E+00
-NFE =  346
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99801357748445E-01
-
-X( 1) = (  9.11524419535723E-03, -5.23211640109898E-01)
-X( 2) = ( -6.03970044366334E-01, -8.25669341261756E-01)
-X( 3) = (  3.39779277804856E-01, -3.70849290806154E-01)
-X( 4) = (  8.53527814698161E-01,  2.75368021687411E-02)
-
-X( 5) = (  1.03402960237247E-01, -4.87890435761961E-01)
-
-PATH NUMBER =       461
-
-ARCLEN =  4.47730616886743E+00
-NFE =  410
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99973233254755E-01
-
-X( 1) = ( -1.32635542167314E-02,  2.78368450583282E-02)
-X( 2) = ( -1.77278821188377E+00,  4.09866533380248E-01)
-X( 3) = (  1.40016229641928E+00, -4.37064359178326E-01)
-X( 4) = (  9.17820142135815E-01,  3.45402084201014E-02)
-
-X( 5) = (  3.54429678989845E-01, -6.24985377304181E-01)
-
-PATH NUMBER =       462
-
-ARCLEN =  1.91398600819807E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.89464334362353E-01
-
-X( 1) = ( -1.49865445516639E-01,  7.72231590496242E-01)
-X( 2) = ( -1.25267198574416E+00,  9.53439595320875E-01)
-X( 3) = (  8.41761601670565E-01, -6.66510048814739E-01)
-X( 4) = (  6.92721602909047E-01,  9.75986243488832E-02)
-
-X( 5) = (  7.63223510004672E-01,  3.63553081247031E-01)
-
-PATH NUMBER =       463
-
-ARCLEN =  4.87606204785838E+00
-NFE =  528
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999751E-01
-
-X( 1) = ( -5.65338384071262E+01, -7.44328493315685E+01)
-X( 2) = (  3.38223492030372E+02, -1.12051113722850E+02)
-X( 3) = (  8.92317871330995E-01,  2.09131327600140E-03)
-X( 4) = ( -1.57533371619259E-01,  3.19294398856594E-02)
-
-X( 5) = ( -3.24661170170573E-03,  1.05891591764947E-03)
-
-PATH NUMBER =       464
-
-ARCLEN =  2.32957450434117E+00
-NFE =  680
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97606814259657E-01
-
-X( 1) = ( -5.82722359472584E-01, -3.97264274745613E-01)
-X( 2) = ( -1.28537805792251E+00, -1.00576062168852E+00)
-X( 3) = (  7.14901967627882E-01,  1.31403196434837E-01)
-X( 4) = (  5.71336023141119E-01, -1.91019617846468E-01)
-
-X( 5) = (  3.85893903751216E-01, -4.61700044876277E-01)
-
-PATH NUMBER =       465
-
-ARCLEN =  2.55099713050562E+00
-NFE =  414
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999947603916E-01
-
-X( 1) = ( -4.08892965631127E+00,  3.03814873569433E+00)
-X( 2) = ( -6.94916437241394E-01,  7.67623835744277E-01)
-X( 3) = (  6.16137239218578E-01, -1.22688953684437E-01)
-X( 4) = (  7.05845632700862E-01,  3.10847144386414E-01)
-
-X( 5) = (  7.08285798678369E-02,  1.07311601782158E-01)
-
-PATH NUMBER =       466
-
-ARCLEN =  2.41372224474630E+00
-NFE =  271
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999856E-01
-
-X( 1) = ( -2.30057630475916E+01,  1.64573727941242E+01)
-X( 2) = ( -2.82406567549744E+02, -2.42508170019101E+02)
-X( 3) = (  2.79838015728549E-04,  1.22039689412258E-01)
-X( 4) = (  8.98303971654723E-01,  6.87307874938742E-03)
-
-X( 5) = (  5.65766327437902E-04, -2.38452801517909E-03)
-
-PATH NUMBER =       467
-
-ARCLEN =  1.90000116545252E+00
-NFE =  196
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.82524345133568E-08
-
-X( 1) = ( -3.05088874300168E+06, -2.00500788563726E+07)
-X( 2) = ( -3.11037366531056E+07, -7.91672210006171E+07)
-X( 3) = ( -7.87909634215985E-01,  4.59714346779312E-02)
-X( 4) = (  7.54072741403977E-01,  1.87375967017209E-02)
-
-X( 5) = ( -1.13523646464776E-09, -8.28583413871060E-09)
-
-PATH NUMBER =       468
-
-ARCLEN =  5.16877800649053E+00
-NFE =  401
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.80968816993014E-07
-
-X( 1) = (  7.80019664064201E-01,  8.04709374112186E-01)
-X( 2) = ( -1.58957645216066E-02, -3.83205154826443E-01)
-X( 3) = ( -5.38398218885972E+04,  6.72310740381351E+05)
-X( 4) = (  8.04060132488788E-01, -1.12803807442140E-01)
-
-X( 5) = (  3.46898638555414E-08,  1.08036594930567E-06)
-
-PATH NUMBER =       469
-
-ARCLEN =  2.17407030710900E+00
-NFE =  266
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999271E-01
-
-X( 1) = (  4.68225143095811E-01, -3.60838708331081E-01)
-X( 2) = (  6.27640342587492E+01, -3.42188642876364E+02)
-X( 3) = (  5.88198974056992E-01,  2.99337864723195E-01)
-X( 4) = (  1.25331684124284E+02,  1.27310733275735E+02)
-
-X( 5) = ( -1.37544769567411E-03, -1.43407458016652E-03)
-
-PATH NUMBER =       470
-
-ARCLEN =  3.24464463008378E+00
-NFE =  423
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97944548602816E-01
-
-X( 1) = (  1.08997689751832E-02,  1.64178649481579E-01)
-X( 2) = ( -8.76017329173880E-01,  1.19949314565221E-01)
-X( 3) = (  5.59524385437481E-01, -2.94029779958187E-01)
-X( 4) = (  6.96599062533819E-01,  8.48609468431005E-02)
-
-X( 5) = (  1.34527411488355E+00, -6.35124974046972E-01)
-
-PATH NUMBER =       471
-
-ARCLEN =  3.90138221311554E+00
-NFE =  471
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96872087969918E-01
-
-X( 1) = ( -8.65330788213829E-02,  4.45909597340870E-01)
-X( 2) = ( -6.95447947569746E-01,  3.20722480034606E-01)
-X( 3) = (  6.26100385035367E-01,  1.36477667033123E-01)
-X( 4) = (  7.28381756561009E-01, -2.01209795262959E-01)
-
-X( 5) = (  3.91982965309979E-01,  7.04470159352229E-01)
-
-PATH NUMBER =       472
-
-ARCLEN =  2.82284674794081E+00
-NFE =  307
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.91114121502446E-01
-
-X( 1) = ( -2.98634327979949E-02,  5.68176088255574E-01)
-X( 2) = ( -1.21421858654419E+00,  4.38089616406538E-01)
-X( 3) = (  7.52004937581423E-01, -3.24556451237349E-02)
-X( 4) = (  3.98684314566429E-01,  1.76706305967240E-01)
-
-X( 5) = (  6.33035513763069E-01,  8.43423467459099E-01)
-
-PATH NUMBER =       473
-
-ARCLEN =  1.59075334098769E+00
-NFE =  316
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97467034735367E-01
-
-X( 1) = ( -3.61247544610539E-01,  7.29330922042841E-01)
-X( 2) = ( -1.48042084191180E+00,  1.21281967782029E+00)
-X( 3) = (  6.28975237645886E-01, -8.70660907340765E-02)
-X( 4) = (  7.40030372769011E-01,  3.30956174986703E-01)
-
-X( 5) = (  3.48755689214390E-01,  2.48909728144480E-01)
-
-PATH NUMBER =       474
-
-ARCLEN =  2.20792929945090E+00
-NFE =  315
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99952347018218E-01
-
-X( 1) = ( -3.48231820113929E-01, -4.67129323801036E-01)
-X( 2) = ( -2.00640583255686E+00, -1.35725328674353E+00)
-X( 3) = (  8.52606341719007E-01, -1.94968280201000E-01)
-X( 4) = (  5.82649392372996E-01,  1.05270984953318E-01)
-
-X( 5) = (  9.58348069793582E-02, -3.16586841052774E-01)
-
-PATH NUMBER =       475
-
-ARCLEN =  2.91692275497659E+00
-NFE =  285
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.36531786528631E-11
-
-X( 1) = (  5.28974592495836E-01, -6.06898329016100E-02)
-X( 2) = (  3.90638788601344E+10, -1.26545911311265E+10)
-X( 3) = (  6.26932790939700E+09,  1.00267426255162E+10)
-X( 4) = ( -3.00018011447130E+10,  2.03650179163408E+10)
-
-X( 5) = ( -1.03253652372973E-11,  5.89750557417057E-12)
-
-PATH NUMBER =       476
-
-ARCLEN =  1.59742683256240E+00
-NFE =  154
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.14459151759572E-13
-
-X( 1) = (  7.78098141487381E+11, -4.48735462885932E+10)
-X( 2) = (  1.72012132897528E+12, -1.30953097616470E+12)
-X( 3) = (  5.08342552571989E-01,  5.72557154075785E-03)
-X( 4) = ( -3.30448048555035E+11, -1.12042182292004E+11)
-
-X( 5) = ( -2.83323196717880E-13, -1.42545480627532E-14)
-
-PATH NUMBER =       477
-
-ARCLEN =  3.06541683402082E+00
-NFE =  338
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998457268153E-01
-
-X( 1) = (  4.94841668207849E-01,  6.52361129092947E-01)
-X( 2) = (  3.18867789646744E-01, -1.29413132857478E+00)
-X( 3) = (  8.38188021066273E-01, -1.82290479323986E+00)
-X( 4) = (  5.16938812575097E-01, -8.39290323814540E-02)
-
-X( 5) = ( -2.15453613895514E-01, -1.86563992764038E-01)
-
-PATH NUMBER =       478
-
-ARCLEN =  2.04002618402212E+00
-NFE =  355
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99949068423553E-01
-
-X( 1) = (  7.29711411118167E-01,  2.54959939167291E-01)
-X( 2) = (  1.56438717928200E-01, -1.11741365132845E+00)
-X( 3) = (  5.94750616527328E-01, -3.74265859361339E-01)
-X( 4) = ( -7.39520550256367E-02,  5.43897752613034E-01)
-
-X( 5) = ( -3.43986476411839E-01, -9.43228755412673E-02)
-
-PATH NUMBER =       479
-
-ARCLEN =  2.49945397556227E+00
-NFE =  234
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999919E-01
-
-X( 1) = (  6.37659754054395E-01, -6.79238935061042E-02)
-X( 2) = ( -1.51982563994065E+03,  9.47216847718117E+00)
-X( 3) = ( -1.71317603988294E+00, -7.28098102933593E-01)
-X( 4) = (  1.99157403030537E+02, -3.82747156940435E+02)
-
-X( 5) = (  4.12210223331487E-04, -2.84753420877475E-04)
-
-PATH NUMBER =       480
-
-ARCLEN =  1.78940117626468E+01
-NFE =  443
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97061026117586E-01
-
-X( 1) = (  2.96353106597943E-01,  4.26413110541773E-01)
-X( 2) = ( -8.38788613568402E-01,  1.32496991916119E-01)
-X( 3) = (  7.18967444476049E-01, -9.83991634764011E-02)
-X( 4) = (  3.54138524107038E-01,  8.93783421788000E-02)
-
-X( 5) = ( -1.28083642753344E+00,  1.88356711911643E+00)
-
-PATH NUMBER =       481
-
-ARCLEN =  4.80069782534521E+00
-NFE =  481
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996913729349E-01
-
-X( 1) = (  6.16573594311494E-01, -3.66493749233436E-01)
-X( 2) = ( -1.64233202171744E+00, -2.20042012053853E+00)
-X( 3) = (  3.75194279365452E-01, -1.98406163017511E-01)
-X( 4) = (  6.39442723747573E-01,  5.53133008411909E-01)
-
-X( 5) = ( -5.70923488109340E-02, -2.41839732428766E-01)
-
-PATH NUMBER =       482
-
-ARCLEN =  4.35964457228944E+00
-NFE =  387
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99353497671579E-01
-
-X( 1) = ( -8.17764719311029E-02,  8.57458927583538E-01)
-X( 2) = ( -1.53667175459748E+00,  1.03263636961886E+00)
-X( 3) = (  5.51632845631516E-01, -1.07720250663305E-01)
-X( 4) = (  8.36856319966898E-01,  2.87563267363234E-01)
-
-X( 5) = (  4.30851079499290E-01,  3.04043954938525E-01)
-
-PATH NUMBER =       483
-
-ARCLEN =  2.73976291031113E+00
-NFE =  289
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999917E-01
-
-X( 1) = ( -2.37553667210650E+01,  2.20874796573103E+01)
-X( 2) = ( -3.34888963031083E+02, -2.55565224284012E+02)
-X( 3) = (  8.99626205462052E-01,  5.70805492061366E-03)
-X( 4) = (  3.68705521155568E-03,  1.02210415088152E-01)
-
-X( 5) = (  6.09238376983906E-04, -2.09314090378539E-03)
-
-PATH NUMBER =       484
-
-ARCLEN =  1.43997783943726E+00
-NFE =  157
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.95826059488852E-14
-
-X( 1) = ( -4.63348222683143E+12,  3.49296597537042E+11)
-X( 2) = ( -1.49267707493548E+13,  4.18249898315046E+12)
-X( 3) = (  4.92874048140137E-01, -7.75606556314992E-03)
-X( 4) = (  2.05344177488221E+12,  5.22265036212657E+12)
-
-X( 5) = (  4.46262493104810E-14, -1.53570190418451E-14)
-
-PATH NUMBER =       485
-
-ARCLEN =  3.12711362420348E+00
-NFE =  322
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999876E-01
-
-X( 1) = (  4.18301806099294E+01, -1.53243511808355E+01)
-X( 2) = (  2.78404317443909E+02, -3.84684253138361E+02)
-X( 3) = ( -5.76320868151234E-02, -8.52697717936111E-02)
-X( 4) = (  8.97903248950205E-01,  5.86875020552765E-03)
-
-X( 5) = ( -1.56239166333184E-03, -4.86078960281540E-04)
-
-PATH NUMBER =       486
-
-ARCLEN =  1.85061371774002E+00
-NFE =  280
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999911412E-01
-
-X( 1) = (  1.84550748165727E+01,  4.20067956474432E+01)
-X( 2) = (  6.63886277342724E+01,  2.66957993032946E+00)
-X( 3) = (  9.75971719104624E-01, -3.62263585355345E-02)
-X( 4) = ( -2.29647055326486E-02, -3.38602870991597E-02)
-
-X( 5) = ( -5.20620619020723E-03,  4.71720862640789E-03)
-
-PATH NUMBER =       487
-
-ARCLEN =  2.51186327791480E+00
-NFE =  505
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99355568080476E-01
-
-X( 1) = (  9.20563004720730E-01, -1.57950825462504E-01)
-X( 2) = ( -5.12535434547103E-01, -8.81947780990577E-01)
-X( 3) = (  6.19203108857509E-01,  6.22678718463177E-02)
-X( 4) = ( -5.12111116201847E-01, -3.47685515914338E-01)
-
-X( 5) = ( -5.41884062702271E-01, -1.93594821798930E-01)
-
-PATH NUMBER =       488
-
-ARCLEN =  2.19142745978549E+00
-NFE =  226
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92248366691095E-01
-
-X( 1) = (  8.66625949498292E-01,  2.06144459485784E-02)
-X( 2) = (  3.73646852229741E-01, -3.37628935555157E-01)
-X( 3) = (  5.34876075397910E-02, -2.88366279725131E-01)
-X( 4) = ( -2.49432599858685E-01,  9.69196510555226E-02)
-
-X( 5) = ( -6.93950245445797E-01,  5.98112858181215E-02)
-
-PATH NUMBER =       489
-
-ARCLEN =  2.14871138557420E+00
-NFE =  281
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.23311194577766E-05
-
-X( 1) = (  8.41310536286826E-01, -1.24466276283719E-01)
-X( 2) = ( -5.74422650620065E-02, -4.06901003861562E-01)
-X( 3) = (  1.54639828031309E+05, -2.39976652181931E+05)
-X( 4) = (  4.34615165555267E-02,  5.82830402456693E-01)
-
-X( 5) = ( -1.27909021779759E-06, -2.21025726518295E-06)
-
-PATH NUMBER =       490
-
-ARCLEN =  4.82472254370486E+00
-NFE =  249
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.51241991491092E-11
-
-X( 1) = (  4.33427253748531E+12,  5.88438839020337E+11)
-X( 2) = ( -1.68836681743344E+12,  5.65070693889305E+12)
-X( 3) = ( -9.31096661383208E+11, -4.12790370165861E+12)
-X( 4) = (  6.12303946158700E-01, -1.26670705589455E-02)
-
-X( 5) = (  1.09363500243667E-13, -2.43919251116664E-13)
-
-PATH NUMBER =       491
-
-ARCLEN =  5.08828028119632E+00
-NFE =  333
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99689766520462E-01
-
-X( 1) = (  5.41289710634317E-01, -2.26966007632010E-01)
-X( 2) = ( -4.16249373695053E-01,  2.65993060089917E+00)
-X( 3) = ( -4.78159114514211E-01, -2.14260583022939E+00)
-X( 4) = (  5.51055910708558E-01,  2.58720752132082E-01)
-
-X( 5) = (  3.02935447648477E-01, -8.56862676694697E-02)
-
-PATH NUMBER =       492
-
-ARCLEN =  6.66619984545226E+00
-NFE =  467
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999989913632E-01
-
-X( 1) = ( -3.97764481283010E-02, -3.79121683588724E-02)
-X( 2) = ( -3.24110467754870E+01,  5.81446819403165E+00)
-X( 3) = (  9.64300997569616E-01, -3.05278430807777E-02)
-X( 4) = ( -1.40269762213491E+01,  1.31576154479913E+01)
-
-X( 5) = (  3.18994586810040E-02, -2.06919593390120E-02)
-
-PATH NUMBER =       493
-
-ARCLEN =  3.38363744549684E+00
-NFE =  260
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999985E-01
-
-X( 1) = (  3.80173004850200E-02, -2.67079070846602E-02)
-X( 2) = ( -8.78714397349036E+02, -9.76571841932718E+02)
-X( 3) = (  1.03817813951713E+00, -2.31684922534420E-02)
-X( 4) = ( -4.33104991282049E+02, -2.30700230729579E+02)
-
-X( 5) = (  4.40213907847366E-05, -7.98906709169476E-04)
-
-PATH NUMBER =       494
-
-ARCLEN =  3.23493353886022E+00
-NFE =  280
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.51781846302722E-12
-
-X( 1) = (  4.24884052939594E-01,  1.31102890611575E-02)
-X( 2) = ( -5.14293603998997E+11,  9.09080066427271E+11)
-X( 3) = ( -2.65766034930351E+10, -3.96046973187195E+11)
-X( 4) = ( -9.32239201599677E+10,  1.66927454662443E+11)
-
-X( 5) = (  9.06022083529620E-13, -8.19229666743082E-14)
-
-PATH NUMBER =       495
-
-ARCLEN =  1.95343181948994E+00
-NFE =  181
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.13334500322491E-13
-
-X( 1) = (  5.01204986151616E-01, -8.67326707186771E-03)
-X( 2) = ( -1.72734971139362E+13, -1.10509551293693E+13)
-X( 3) = (  8.96107052112065E+12, -5.24414139197750E+10)
-X( 4) = ( -6.10185903599627E+12, -8.49467616225603E+11)
-
-X( 5) = ( -1.38379433779756E-14, -4.55052120117150E-14)
-
-PATH NUMBER =       496
-
-ARCLEN =  1.79307829840153E+00
-NFE =  406
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98278880940514E-01
-
-X( 1) = (  6.70129703964547E-01,  4.84364217280046E-02)
-X( 2) = (  7.40199912719224E-01, -6.48108143184341E-01)
-X( 3) = (  3.02373413741482E-01, -9.38255608169234E-01)
-X( 4) = ( -5.37443350792569E-01, -9.84776000748474E-02)
-
-X( 5) = ( -4.69653215174658E-01, -1.01357875142910E-01)
-
-PATH NUMBER =       497
-
-ARCLEN =  2.11534048207792E+00
-NFE =  338
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.55556950826009E-12
-
-X( 1) = (  2.77952538207823E+10, -6.23059339343894E+10)
-X( 2) = ( -1.71764877040896E+11,  1.29958185729666E+11)
-X( 3) = ( -7.66002039548219E+10, -5.71607855483463E+10)
-X( 4) = (  4.97858784772538E-01,  4.48354941458016E-02)
-
-X( 5) = (  2.22656390395405E-12, -1.09911439758609E-12)
-
-PATH NUMBER =       498
-
-ARCLEN =  2.46038240408351E+00
-NFE =  198
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.77903191191047E-12
-
-X( 1) = (  5.48446523708841E+11,  2.80236191043511E+12)
-X( 2) = ( -3.28279289688419E+12, -3.57859541799243E+12)
-X( 3) = (  3.73863123408989E+12, -1.07975024353467E+12)
-X( 4) = (  6.42029017195962E-01, -1.75457589796730E-01)
-
-X( 5) = ( -1.04950743191543E-13, -6.29173362715063E-14)
-
-PATH NUMBER =       499
-
-ARCLEN =  4.98909821013394E+00
-NFE =  411
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999943918665E-01
-
-X( 1) = (  4.28500023190400E+00,  1.47755766540480E+00)
-X( 2) = ( -1.78968913549720E-01,  1.08368148997784E-01)
-X( 3) = ( -7.05724361257374E-02, -2.03148243456689E+00)
-X( 4) = (  9.50655813660910E-01,  2.33859304040406E-03)
-
-X( 5) = ( -1.47726131281560E-01, -8.62890020375892E-02)
-
-PATH NUMBER =       500
-
-ARCLEN =  6.32275747133372E+00
-NFE =  455
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99975948883817E-01
-
-X( 1) = (  6.78806500727362E-01, -1.63779354952273E-01)
-X( 2) = ( -5.90118182487435E-01,  1.05880627044184E-01)
-X( 3) = ( -1.47648459371387E+00, -5.74655578108876E-01)
-X( 4) = (  8.60081856757780E-01,  1.51186383625660E-01)
-
-X( 5) = (  3.22800886578095E-01, -1.58350150934394E-01)
-
-PATH NUMBER =       501
-
-ARCLEN =  1.95104033350494E+01
-NFE =  370
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90857061724776E-01
-
-X( 1) = ( -1.99613880165068E-01,  1.32592391366711E+00)
-X( 2) = ( -3.04633827532263E+00, -1.08989379930145E-01)
-X( 3) = (  9.30515232903496E-01, -2.65321319158376E-02)
-X( 4) = ( -1.43271731381651E+00, -1.39606295365071E-01)
-
-X( 5) = (  5.00704575995783E-01,  4.79860223513385E-01)
-
-PATH NUMBER =       502
-
-ARCLEN =  5.38056147583756E+00
-NFE =  409
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999989659734E-01
-
-X( 1) = (  1.67410103498611E-02, -1.66292265791916E-02)
-X( 2) = ( -4.12958457760077E+00, -3.07659927346365E+01)
-X( 3) = (  1.01751917458332E+00, -1.27201192962097E-02)
-X( 4) = ( -1.34683353932961E+01, -1.56777250800054E+01)
-
-X( 5) = ( -2.62279899057661E-02, -3.16216523968179E-02)
-
-PATH NUMBER =       503
-
-ARCLEN =  3.01585288834235E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999945089174E-01
-
-X( 1) = (  4.39606234871314E-01, -2.88845808196163E-01)
-X( 2) = (  1.10404774104057E+01, -4.65747908610807E-01)
-X( 3) = (  4.40848363573357E-01,  1.99373106340869E-01)
-X( 4) = (  2.16901097586825E+00, -1.97374714514599E+00)
-
-X( 5) = ( -6.34377443889815E-02,  5.30686925304357E-02)
-
-PATH NUMBER =       504
-
-ARCLEN =  1.92763323258317E+00
-NFE =  270
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99985142251363E-01
-
-X( 1) = (  5.28437084642022E-01,  1.21849284703991E-01)
-X( 2) = (  5.43134523191069E-03, -3.83692079998432E+00)
-X( 3) = (  6.34532809039729E-01, -3.22018303524744E-01)
-X( 4) = ( -8.37728509579080E-01, -1.10196609320035E+00)
-
-X( 5) = ( -1.88590397827412E-01, -1.26202718100811E-01)
-
-PATH NUMBER =       505
-
-ARCLEN =  1.75843510422188E+00
-NFE =  291
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99835151014231E-01
-
-X( 1) = (  6.54995064826801E-01, -5.44537655798339E-02)
-X( 2) = ( -3.83759822565625E-01, -1.17334419054034E+00)
-X( 3) = (  1.09801602881936E+00, -8.62106428787519E-02)
-X( 4) = ( -4.14012589336819E-02, -1.19527631692539E-01)
-
-X( 5) = ( -3.59277896320900E-01, -1.57138269564443E-01)
-
-PATH NUMBER =       506
-
-ARCLEN =  1.92217056394495E+00
-NFE =  259
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90200543386032E-01
-
-X( 1) = (  6.97605353948984E-01,  2.44221229237373E-01)
-X( 2) = (  6.05510092117384E-01, -7.63027425658693E-02)
-X( 3) = (  1.91382772806331E-01, -1.04491118186524E+00)
-X( 4) = ( -4.02390785237184E-01, -3.03377072325021E-02)
-
-X( 5) = ( -6.80923139213547E-01, -9.74854396834894E-03)
-
-PATH NUMBER =       507
-
-ARCLEN =  2.10004043405750E+00
-NFE =  172
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.19882574634718E-11
-
-X( 1) = ( -3.60316344217104E+09,  3.25363349644593E+09)
-X( 2) = (  5.07922435328034E-01, -2.71130138168171E-01)
-X( 3) = (  6.72035900682352E+09,  1.91581230275422E+09)
-X( 4) = (  3.17737582883729E+08, -1.45773643225310E+09)
-
-X( 5) = ( -5.45775162260134E-11,  8.07809072455104E-11)
-
-PATH NUMBER =       508
-
-ARCLEN =  3.56797917035860E+01
-NFE =  316
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999871E-01
-
-X( 1) = (  9.10129115527400E-01, -2.72707417872606E-03)
-X( 2) = ( -1.02059346441711E+03,  6.22955855493756E+02)
-X( 3) = (  2.82860406555304E+02, -5.77597637158278E+02)
-X( 4) = (  7.61088603543154E-02, -2.51222084395007E-02)
-
-X( 5) = (  4.94401414174002E-04, -4.80616188492087E-04)
-
-PATH NUMBER =       509
-
-ARCLEN =  4.06577394048957E+00
-NFE =  277
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999960E-01
-
-X( 1) = ( -3.11040295114447E+01,  5.27057661592543E+01)
-X( 2) = ( -3.43680136717459E-02,  5.62331050705554E-02)
-X( 3) = (  1.00194033257158E+00,  5.14224028019561E-03)
-X( 4) = ( -1.59325022061920E+01,  3.69909498741580E+01)
-
-X( 5) = ( -2.11525238996775E-03,  1.16664267597045E-02)
-
-PATH NUMBER =       510
-
-ARCLEN =  6.77470126082874E+00
-NFE =  615
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999804E-01
-
-X( 1) = (  8.78733463137656E-01,  6.49314293121094E-01)
-X( 2) = (  5.73575851704450E-02, -1.11556279623031E-01)
-X( 3) = (  1.00199358199116E+00, -7.48742587127177E-02)
-X( 4) = ( -2.27776538683977E+01, -5.86980720351419E+00)
-
-X( 5) = ( -2.22749466928818E-02,  5.94631169263363E-02)
-
-PATH NUMBER =       511
-
-ARCLEN =  1.16206353911725E+01
-NFE =  432
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998600509E-01
-
-X( 1) = ( -2.82919964966182E+01,  7.17195162139358E+00)
-X( 2) = ( -2.78035091369165E+01,  1.93185899362185E+01)
-X( 3) = (  9.94415639342633E-01, -2.15077971400161E-03)
-X( 4) = (  5.91310451425220E-03,  2.52781995992011E-03)
-
-X( 5) = (  1.29339341480220E-02,  4.08129857656578E-03)
-
-PATH NUMBER =       512
-
-ARCLEN =  6.08554639567965E+00
-NFE =  315
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92428030499852E-01
-
-X( 1) = (  1.91879296635882E-02, -7.08227198480974E-02)
-X( 2) = ( -3.42655629533796E-02, -1.55496057535835E+00)
-X( 3) = (  1.03584431286486E+00, -1.43809592829221E-02)
-X( 4) = ( -1.33596190893581E+00, -1.05529513765692E+00)
-
-X( 5) = ( -5.16304077313697E-01,  7.43052047103178E-02)
-
-PATH NUMBER =       513
-
-ARCLEN =  2.27367476254074E+00
-NFE =  285
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99918136719997E-01
-
-X( 1) = (  4.31749667226067E-01,  3.08767700460425E-02)
-X( 2) = (  1.94353215510745E+00, -1.13062057186425E+00)
-X( 3) = (  6.24742299777173E-01, -3.68852237756333E-01)
-X( 4) = ( -3.20701290597215E-01, -6.52745384470720E-01)
-
-X( 5) = ( -2.80803859551643E-01,  7.90442069747582E-02)
-
-PATH NUMBER =       514
-
-ARCLEN =  5.19806327484576E+00
-NFE =  298
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.32620642781933E-08
-
-X( 1) = (  3.25945297132454E+09,  1.10429228267605E+09)
-X( 2) = (  6.11027355471725E-01,  2.77328866834628E-01)
-X( 3) = ( -4.42406473976775E+08, -1.21946884410547E+09)
-X( 4) = ( -3.19295526222562E+09, -2.27404662000116E+09)
-
-X( 5) = ( -2.71106623153487E-10,  1.88917640754106E-11)
-
-PATH NUMBER =       515
-
-ARCLEN =  2.46753857522398E+00
-NFE =  299
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93529323383992E-01
-
-X( 1) = (  3.03251119372812E-01,  1.43099954195879E-01)
-X( 2) = (  7.72817964260047E-01, -2.92443813478921E-02)
-X( 3) = (  1.41221742584857E-01, -8.60855816883604E-01)
-X( 4) = ( -3.89882421925557E-02, -9.06435566593966E-02)
-
-X( 5) = ( -1.03757749610836E+00,  3.87964195048154E-01)
-
-PATH NUMBER =       516
-
-ARCLEN =  2.80224357841015E+01
-NFE =  399
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98588952160875E-01
-
-X( 1) = ( -4.96326691091051E-02,  2.95919603520039E-01)
-X( 2) = ( -9.39492581717587E-01,  3.02942717200217E-01)
-X( 3) = (  1.21318432270762E+00, -5.94811809351352E-01)
-X( 4) = (  7.98836293145643E-01,  1.24025463488490E-01)
-
-X( 5) = ( -2.61608503531611E-01, -2.00757683042022E+00)
-
-PATH NUMBER =       517
-
-ARCLEN =  3.89634508250675E+00
-NFE =  426
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998095728532E-01
-
-X( 1) = ( -2.23122029083411E+00,  6.26337268324264E-01)
-X( 2) = (  4.00083960680581E-01, -4.44036315540965E-02)
-X( 3) = (  2.04893718750933E+00, -5.78168211892264E-01)
-X( 4) = (  5.00317554725865E-01,  5.24335208196938E-01)
-
-X( 5) = ( -1.16038440324615E-01,  5.15455316515310E-01)
-
-PATH NUMBER =       518
-
-ARCLEN =  3.61328139728155E+00
-NFE =  405
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99920625392331E-01
-
-X( 1) = (  5.46040933554404E-01,  7.14151249106224E-01)
-X( 2) = (  6.72448270713453E-01, -6.32318436797951E-01)
-X( 3) = (  4.18659810234231E-01, -3.10431810443594E-01)
-X( 4) = ( -5.03023131090819E-01, -1.90554390898548E+00)
-
-X( 5) = ( -2.78575441170708E-01,  3.48302809998527E-01)
-
-PATH NUMBER =       519
-
-ARCLEN =  4.10892762296317E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999992268598E-01
-
-X( 1) = ( -8.61471435814687E-01,  1.48251983657037E+01)
-X( 2) = (  1.46650714266615E+00,  8.32073266440505E+00)
-X( 3) = (  9.85227394843204E-01, -5.15214164518594E-02)
-X( 4) = (  3.78675547104140E-03, -5.32921961095956E-02)
-
-X( 5) = ( -3.78568140447129E-03,  3.46419428613567E-02)
-
-PATH NUMBER =       520
-
-ARCLEN =  7.94717402657246E+00
-NFE =  514
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994466673092E-01
-
-X( 1) = ( -1.42967446363987E-01, -2.04727875161269E+00)
-X( 2) = (  6.51566274853951E-01, -6.10411292816566E-01)
-X( 3) = (  6.14979017611913E-01,  8.13132746858671E-02)
-X( 4) = ( -6.55262291255688E-01, -5.87393129089888E-01)
-
-X( 5) = ( -4.68280108952909E-03, -9.21341289803861E-01)
-
-PATH NUMBER =       521
-
-ARCLEN =  1.41992605613883E+01
-NFE =  241
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.28725627765425E-10
-
-X( 1) = (  5.51521274821584E+08,  1.42945952747149E+08)
-X( 2) = (  4.95422908377081E-01, -2.90496045331904E-01)
-X( 3) = (  1.41906947742462E+09,  3.87929620801245E+08)
-X( 4) = ( -2.44454053547008E+08, -1.59278119796049E+09)
-
-X( 5) = ( -4.26396908883783E-10,  1.89775468560291E-10)
-
-PATH NUMBER =       522
-
-ARCLEN =  4.20911087623963E+00
-NFE =  310
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.63638258566179E-06
-
-X( 1) = (  4.10509645342451E+03,  1.39603356801505E+05)
-X( 2) = ( -3.72994709087544E-01,  2.60316826858194E-02)
-X( 3) = (  8.73195697527367E-01,  1.47673309293831E-03)
-X( 4) = ( -8.62512026382184E+04, -1.91333612268105E+05)
-
-X( 5) = ( -4.93823416167400E-08,  3.69097348149728E-06)
-
-PATH NUMBER =       523
-
-ARCLEN =  3.00123181947755E+00
-NFE =  563
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96958618365525E-01
-
-X( 1) = (  4.20398545509776E-01,  4.97083263708345E-01)
-X( 2) = (  8.28167768592530E-02, -3.86317980889110E-01)
-X( 3) = (  8.47388260704855E-01, -3.75841680934183E-02)
-X( 4) = ( -3.36876911267916E-01, -1.14008889813881E+00)
-
-X( 5) = ( -3.62493389692175E-01,  3.63985347959686E-01)
-
-PATH NUMBER =       524
-
-ARCLEN =  5.96052831902787E+00
-NFE =  294
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92679930957318E-01
-
-X( 1) = ( -2.88982820272267E-02, -6.42475609616658E-04)
-X( 2) = (  7.01808949271990E-01,  6.92622113933061E-03)
-X( 3) = (  1.30318578681549E-01, -5.61459757995630E-01)
-X( 4) = (  3.45618682127319E-01, -1.56614586522707E-01)
-
-X( 5) = ( -4.25788881186987E-01,  1.81436843270682E+00)
-
-PATH NUMBER =       525
-
-ARCLEN =  3.30614484343952E+00
-NFE =  436
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99875851905884E-01
-
-X( 1) = ( -4.82273240610471E-01,  5.09429547699203E-01)
-X( 2) = (  2.45345035899397E-01,  8.42180729229274E-04)
-X( 3) = (  1.20618048651575E+00, -2.71272049841799E-01)
-X( 4) = (  7.29953929453198E-01, -1.57024715941424E-01)
-
-X( 5) = ( -3.92095383952559E-01,  5.71394257721266E-01)
-
-PATH NUMBER =       526
-
-ARCLEN =  3.05222995027992E+00
-NFE =  385
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99856004701795E-01
-
-X( 1) = ( -2.53835802549648E-01,  8.90031036590141E-01)
-X( 2) = (  2.04415188043212E-01,  7.16490948218647E-04)
-X( 3) = (  8.47140571722445E-01,  3.64320971065021E-02)
-X( 4) = (  9.61145411161348E-01, -1.30374560510862E+00)
-
-X( 5) = ( -2.85775624654385E-02,  4.65305156344614E-01)
-
-PATH NUMBER =       527
-
-ARCLEN =  2.63284760598946E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99983429605661E-01
-
-X( 1) = ( -1.37005037844239E+00,  5.83684835030801E-01)
-X( 2) = (  1.43353743167240E-01,  3.59431763480192E-01)
-X( 3) = (  1.13175049287761E+00,  1.56927062798105E-01)
-X( 4) = (  5.58988558317514E-01,  4.21647312707374E-02)
-
-X( 5) = (  7.38478667754806E-02,  3.61811220851506E-01)
-
-PATH NUMBER =       528
-
-ARCLEN =  3.26611805698240E+00
-NFE =  446
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999964815565E-01
-
-X( 1) = ( -4.18379400149921E+00,  2.04720345532032E+00)
-X( 2) = (  1.25249077116539E-01,  8.14087467932279E-02)
-X( 3) = (  8.42745849668046E-01, -8.19571815099465E-03)
-X( 4) = (  1.36057580460785E+00,  1.81082689449975E+00)
-
-X( 5) = (  9.34048092453951E-02,  1.58721800702752E-01)
-
-PATH NUMBER =       529
-
-ARCLEN =  3.89627112754189E+01
-NFE =  379
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92299850509753E-01
-
-X( 1) = ( -3.58763691551416E-01,  8.16981182255746E-01)
-X( 2) = ( -3.14811749705764E+00, -5.94308619950392E-01)
-X( 3) = (  9.30903918520194E-01,  1.64282689051875E-02)
-X( 4) = ( -1.33288054911527E+00,  6.36390684242390E-02)
-
-X( 5) = (  8.48150147363942E-01, -8.62760037404885E-02)
-
-PATH NUMBER =       530
-
-ARCLEN =  5.52995112819336E+00
-NFE =  450
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999418081630E-01
-
-X( 1) = ( -2.34324065682406E+00,  1.97566394227670E+00)
-X( 2) = (  4.64654779564201E-01,  9.11227003167770E-02)
-X( 3) = (  6.28409696754272E-01, -7.43644644121928E-01)
-X( 4) = (  4.45989099269941E+00, -2.31760195815299E+00)
-
-X( 5) = (  1.98574026607511E-01,  1.27848265763518E-01)
-
-PATH NUMBER =       531
-
-ARCLEN =  5.96617005632898E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999993E-01
-
-X( 1) = ( -4.33294035323520E+01,  1.10212255658361E+02)
-X( 2) = ( -2.49047652594196E-01, -1.04185112296610E-01)
-X( 3) = (  9.16147423868049E-01, -4.53119928566639E-02)
-X( 4) = (  1.14936015711547E+02, -2.57302473751748E+02)
-
-X( 5) = (  2.91909689069841E-03,  3.09894292380373E-03)
-
-PATH NUMBER =       532
-
-ARCLEN =  1.91499150425620E+01
-NFE =  311
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98875023128794E-01
-
-X( 1) = (  3.19146915164750E-02, -2.09948736146522E-01)
-X( 2) = ( -2.41544998931216E-01, -4.92367828695967E-01)
-X( 3) = (  9.62103235130630E-01, -5.37918441607952E-02)
-X( 4) = (  4.13120642744989E-01, -6.05662998189262E-01)
-
-X( 5) = ( -1.66202028711984E+00, -6.65776292031723E-01)
-
-PATH NUMBER =       533
-
-ARCLEN =  4.85989949444281E+00
-NFE =  277
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97665288941484E-01
-
-X( 1) = (  8.84348657523607E-02,  2.70912853441747E-01)
-X( 2) = ( -3.80014591523012E-02,  4.85227554726455E-03)
-X( 3) = (  9.82457278667779E-01, -7.00041820085397E-03)
-X( 4) = (  4.14958652468912E-01, -6.67733251856806E-01)
-
-X( 5) = ( -4.32508446707742E-01,  6.80492384211978E-01)
-
-PATH NUMBER =       534
-
-ARCLEN =  3.33986943760637E+00
-NFE =  530
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99777002635893E-01
-
-X( 1) = (  4.06821812245833E-02,  4.07305079533223E-01)
-X( 2) = (  8.44540112296773E-01,  5.91808595178895E-01)
-X( 3) = (  1.08995470226528E+00, -7.36664554523126E-01)
-X( 4) = (  3.72653795671679E-01, -2.29096529034200E-01)
-
-X( 5) = ( -3.74243846723181E-01,  3.60872436176399E-01)
-
-PATH NUMBER =       535
-
-ARCLEN =  6.26341595712299E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99965874601756E-01
-
-X( 1) = ( -2.67124879038979E-01,  2.19859099001128E-01)
-X( 2) = (  2.68690065021747E-01,  5.50969369215617E-01)
-X( 3) = (  1.54798734637022E+00, -9.19934174699975E-01)
-X( 4) = (  8.59334797096585E-01, -1.64871009525061E-01)
-
-X( 5) = ( -1.01409749345652E+00,  2.67519625436472E-01)
-
-PATH NUMBER =       536
-
-ARCLEN =  4.08693380425455E+00
-NFE =  272
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999963E-01
-
-X( 1) = ( -2.12640238684185E+01,  4.26351887425476E+01)
-X( 2) = ( -1.59676242356933E-01,  4.80526652417608E-02)
-X( 3) = (  9.73365188429889E-01,  9.16226713009555E-03)
-X( 4) = (  8.33678097271244E+01, -1.27559224404720E+02)
-
-X( 5) = (  7.89576045401923E-03,  4.75454426362622E-03)
-
-PATH NUMBER =       537
-
-ARCLEN =  3.50538436447261E+00
-NFE =  227
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.54785767297122E-12
-
-X( 1) = ( -1.28727196495538E+11,  3.17280907589450E+11)
-X( 2) = (  3.32577448340028E+11,  1.55181956237772E+10)
-X( 3) = (  4.89964866656306E+11, -2.54137760054998E+11)
-X( 4) = (  4.99503883761283E-01, -4.80388780647519E-03)
-
-X( 5) = ( -9.18640760249473E-13,  3.39004974266033E-13)
-
-PATH NUMBER =       538
-
-ARCLEN =  4.01881950330709E+00
-NFE =  395
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999898536286E-01
-
-X( 1) = ( -5.52931459346275E+00, -1.41317915985808E+00)
-X( 2) = ( -1.81558735106032E+00, -1.38174260359660E+00)
-X( 3) = (  6.20648518330266E-01, -2.48912320540917E-01)
-X( 4) = (  5.67972780963305E-01,  1.61125614036088E-01)
-
-X( 5) = (  1.22240467491586E-01, -1.75791344409197E-02)
-
-PATH NUMBER =       539
-
-ARCLEN =  5.97043080900199E+00
-NFE =  542
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99866531452957E-01
-
-X( 1) = ( -4.93911468695112E-01,  7.77893254665076E-02)
-X( 2) = ( -1.70999020842838E-01, -3.26447431423577E-01)
-X( 3) = (  8.07730696345552E-01,  7.33910946797518E-02)
-X( 4) = (  1.31024805368816E+00, -4.45147892768900E-01)
-
-X( 5) = (  1.55586777186999E+00,  1.20200549300814E+00)
-
-PATH NUMBER =       540
-
-ARCLEN =  7.76471327857221E+00
-NFE =  422
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998190044E-01
-
-X( 1) = (  2.92970864569068E-01, -6.60321098761964E-01)
-X( 2) = (  2.58685718853899E-01,  1.12074596199737E+00)
-X( 3) = (  6.22448902640677E-01, -3.86984362188953E-02)
-X( 4) = (  2.29868600270021E+00, -6.92177503567578E+00)
-
-X( 5) = (  1.95692257635838E-01,  7.16437102222570E-02)
-
-PATH NUMBER =       541
-
-ARCLEN =  4.29522689323890E+00
-NFE =  386
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999600648536E-01
-
-X( 1) = (  1.11544384400567E+00, -2.49028627166878E+00)
-X( 2) = (  3.75784254711330E-01, -1.21611788392425E+00)
-X( 3) = (  5.42175041477857E-01, -6.31739346887615E-01)
-X( 4) = (  4.87719872456151E-01,  6.77602625910184E-02)
-
-X( 5) = ( -5.62554839485993E-02, -1.89252312751505E-01)
-
-PATH NUMBER =       542
-
-ARCLEN =  1.54970924111907E+01
-NFE =  587
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99377848086587E-01
-
-X( 1) = ( -5.82668796568832E-02, -1.45262444635774E-01)
-X( 2) = ( -4.28377276826294E-01, -4.18978520313568E-01)
-X( 3) = (  8.43360696957574E-01, -1.28857832555628E-01)
-X( 4) = (  6.86078163124064E-01, -9.83169358892983E-02)
-
-X( 5) = ( -7.28441118331107E-01, -1.55530295905072E+00)
-
-PATH NUMBER =       543
-
-ARCLEN =  2.20891122893922E+01
-NFE =  275
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87295500762844E-01
-
-X( 1) = ( -3.88549912278792E-01,  2.78056302358609E-01)
-X( 2) = ( -6.78458177767982E-01,  1.56438877105460E-01)
-X( 3) = (  1.14955796541015E+00, -5.25267933744660E-02)
-X( 4) = (  6.09633761564965E-01,  6.97675864723688E-02)
-
-X( 5) = (  1.53719893482644E-01,  1.64728939324552E+00)
-
-PATH NUMBER =       544
-
-ARCLEN =  1.83389241327229E+01
-NFE =  318
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92430131040896E-01
-
-X( 1) = ( -2.06466166641322E-01,  1.93227272729450E-01)
-X( 2) = ( -5.85367141380296E-01,  3.95400672864136E-02)
-X( 3) = (  1.00534539686512E+00, -1.95867853563317E-01)
-X( 4) = (  6.06486366827839E-01, -3.25857595085979E-02)
-
-X( 5) = ( -8.87217399716026E-01,  4.82873264379366E+00)
-
-PATH NUMBER =       545
-
-ARCLEN =  3.25486623245528E+00
-NFE =  428
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87815263506641E-01
-
-X( 1) = ( -6.09456243415930E-01,  3.28859763206964E-01)
-X( 2) = ( -1.19955914661990E+00,  1.17103066087815E-01)
-X( 3) = (  1.02599897126068E+00, -5.20528006635932E-02)
-X( 4) = (  7.11878936169632E-01, -6.39906330926866E-04)
-
-X( 5) = (  9.11907804452587E-01,  3.11250223591720E-01)
-
-PATH NUMBER =       546
-
-ARCLEN =  3.66023225521506E+00
-NFE =  272
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.11414104979363E-06
-
-X( 1) = ( -1.87528667372717E+06, -6.32353979732647E+05)
-X( 2) = ( -9.68088807406499E-01,  5.47233335862244E-01)
-X( 3) = (  6.93659436796384E-01, -2.82499290846688E-02)
-X( 4) = (  7.34454826060025E+05,  1.40646732026759E+06)
-
-X( 5) = (  4.37839628515094E-07, -1.06668829116807E-07)
-
-PATH NUMBER =       547
-
-ARCLEN =  2.94221058258784E+00
-NFE =  298
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.77665000168709E-01
-
-X( 1) = ( -4.47171083768267E-01,  1.21726877269913E-01)
-X( 2) = ( -8.61051895485625E-01, -1.31154759805302E-01)
-X( 3) = (  7.39081898189388E-01,  9.44460341474115E-02)
-X( 4) = (  5.44703619070444E-01, -2.41370477635612E-01)
-
-X( 5) = (  9.60874232386356E-01,  4.28846513722948E-01)
-
-PATH NUMBER =       548
-
-ARCLEN =  2.99575401375299E+00
-NFE =  290
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.51798731725051E-12
-
-X( 1) = (  6.26467530398941E+10,  1.00720132774747E+11)
-X( 2) = (  3.48294783047110E+11,  4.20623750565587E+11)
-X( 3) = ( -7.50061491039612E+10, -8.07960172939259E+10)
-X( 4) = (  5.02426698979876E-01,  9.73068291395105E-03)
-
-X( 5) = ( -6.70985348446423E-14,  1.59018398492375E-12)
-
-PATH NUMBER =       549
-
-ARCLEN =  2.47970026666327E+00
-NFE =  371
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997417847952E-01
-
-X( 1) = (  4.90601477463069E-01, -1.76428701607770E+00)
-X( 2) = ( -1.94383228437400E+00, -2.10096131059290E+00)
-X( 3) = (  5.45452101690276E-01,  1.28307020667406E-01)
-X( 4) = (  5.77393802587847E-01, -3.97295655795821E-01)
-
-X( 5) = (  2.32659264175377E-02, -1.96619132632387E-01)
-
-PATH NUMBER =       550
-
-ARCLEN =  2.38663951408298E+00
-NFE =  338
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999889438598E-01
-
-X( 1) = (  4.91161555535110E-01, -2.37047900948739E-01)
-X( 2) = (  2.22639408719648E-01, -1.45117962172562E+01)
-X( 3) = (  4.59081981402771E+00,  9.06385288797289E+00)
-X( 4) = (  4.92857671551719E-01,  2.29589648692776E-01)
-
-X( 5) = ( -5.54231814259434E-02, -2.60294281632922E-03)
-
-PATH NUMBER =       551
-
-ARCLEN =  2.90834357999550E+00
-NFE =  446
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99856915468773E-01
-
-X( 1) = ( -6.51218171559294E-02, -1.45211041676295E-01)
-X( 2) = ( -8.99403695849206E-01, -4.56006101087179E-01)
-X( 3) = (  8.77713849219708E-01, -3.58397055230019E-01)
-X( 4) = (  7.99148756587741E-01,  1.04094384791728E-01)
-
-X( 5) = (  2.78887585898761E-02, -7.44345422999321E-01)
-
-PATH NUMBER =       552
-
-ARCLEN =  3.64953190499029E+00
-NFE =  133
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.41332634753349E-12
-
-X( 1) = (  5.01781376309211E-01,  9.60743611266243E-04)
-X( 2) = ( -1.76844353710196E+11, -4.74122516855189E+10)
-X( 3) = (  1.18803523188636E+11, -9.24886415835383E+10)
-X( 4) = (  1.58579041567594E+11,  1.34644100405241E+11)
-
-X( 5) = ( -3.24798429254466E-13, -2.27432173571449E-12)
-
-PATH NUMBER =       553
-
-ARCLEN =  5.63460661127998E+01
-NFE =  820
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.03293795537885E-10
-
-X( 1) = (  1.69880809615448E+09, -1.05740510450931E+09)
-X( 2) = (  2.05330819687142E+09,  5.51223962773993E+09)
-X( 3) = (  4.99747825034792E-01, -2.52581662920926E-04)
-X( 4) = ( -3.87027529449727E+09, -3.86486027377905E+09)
-
-X( 5) = (  3.05409144697212E-11,  1.28606445913733E-10)
-
-PATH NUMBER =       554
-
-ARCLEN =  5.23565780318892E+00
-NFE =  442
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99748109207602E-01
-
-X( 1) = ( -1.64047433046904E-01, -3.67332135987028E-01)
-X( 2) = ( -1.20774317612247E+00, -8.85166662040892E-01)
-X( 3) = (  8.88567727817488E-01, -1.03425706679761E-01)
-X( 4) = (  6.16145842366764E-01,  4.92399371010305E-02)
-
-X( 5) = (  6.75986768493725E-02, -5.71961342366864E-01)
-
-PATH NUMBER =       555
-
-ARCLEN =  4.45208214774873E+00
-NFE =  269
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999980E-01
-
-X( 1) = ( -6.28819670138471E-02, -3.81525272344956E-02)
-X( 2) = ( -6.24437741478696E+02,  9.66038227465022E+02)
-X( 3) = (  9.45754738325595E-01, -3.68698801622029E-02)
-X( 4) = ( -7.01936623397232E+01,  3.39165499955178E+02)
-
-X( 5) = (  8.31491371031657E-04,  2.69736468250971E-04)
-
-PATH NUMBER =       556
-
-ARCLEN =  2.58824608360643E+00
-NFE =  293
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99992308132621E-01
-
-X( 1) = (  6.14262494005750E-01, -8.93244702878534E-01)
-X( 2) = ( -1.65310947599505E-01, -2.23715155261716E+00)
-X( 3) = (  5.11372156412871E-01, -8.75869176359354E-02)
-X( 4) = (  5.25874489461005E-01,  6.69860886502607E-01)
-
-X( 5) = ( -1.39871371675007E-01, -2.04415348879618E-01)
-
-PATH NUMBER =       557
-
-ARCLEN =  1.76796054730704E+00
-NFE =  172
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.57998786411664E-14
-
-X( 1) = ( -1.59659667037920E+12, -5.22195013460022E+13)
-X( 2) = ( -5.12678174435110E+13, -6.17502161104295E+13)
-X( 3) = (  5.86446505315720E-01, -1.61294051757098E-02)
-X( 4) = ( -1.26127400892065E+13,  2.82116205956325E+13)
-
-X( 5) = (  4.90547272941066E-16, -6.21350844040580E-15)
-
-PATH NUMBER =       558
-
-ARCLEN =  1.89288202646377E+00
-NFE =  262
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997757382686E-01
-
-X( 1) = (  1.36093300684891E+00, -5.88787926222819E-01)
-X( 2) = ( -1.07395250406581E+00, -1.60090481601637E+00)
-X( 3) = (  4.67173917515380E-01, -3.25885882849272E-01)
-X( 4) = (  4.49346396282396E-01,  3.23876020429679E-02)
-
-X( 5) = ( -1.07946695970177E-01, -2.28273676841380E-01)
-
-PATH NUMBER =       559
-
-ARCLEN =  1.67216754452396E+00
-NFE =  295
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84516689525827E-01
-
-X( 1) = (  9.48069876487733E-01,  5.27996118052201E-03)
-X( 2) = ( -2.66166026436875E-01, -1.66091118400853E-01)
-X( 3) = (  5.15149499270254E-01, -1.02178761067626E+00)
-X( 4) = ( -2.94978111068234E-01,  3.87084145106058E-01)
-
-X( 5) = ( -3.65217903246515E-01, -3.15339878848592E-01)
-
-PATH NUMBER =       560
-
-ARCLEN =  3.20347783311503E+00
-NFE =  725
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99992182851926E-01
-
-X( 1) = (  4.80909720756372E-01, -4.65828040327465E-02)
-X( 2) = ( -1.83539650488182E+00, -1.18904256275757E+00)
-X( 3) = (  6.72737240008341E-01, -5.28333747044481E-01)
-X( 4) = (  5.64352564238446E-01,  5.45253746989486E-01)
-
-X( 5) = ( -4.10799401972968E-02, -3.17477264656809E-01)
-
-PATH NUMBER =       561
-
-ARCLEN =  1.85137184047372E+00
-NFE =  368
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99897738171050E-01
-
-X( 1) = (  7.26813784912320E-01, -3.57840081106663E-02)
-X( 2) = ( -9.27672104307469E-01, -3.94000380521582E-01)
-X( 3) = (  4.22774299901350E-01, -1.12924381164352E+00)
-X( 4) = (  6.43085019135633E-01,  7.87528006895899E-01)
-
-X( 5) = ( -8.42422264667576E-02, -3.45009618315064E-01)
-
-PATH NUMBER =       562
-
-ARCLEN =  5.25227574419815E+00
-NFE =  273
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.29932456994435E-12
-
-X( 1) = (  1.14036093938204E+12,  3.70186654530225E+11)
-X( 2) = ( -9.79095084689787E+11,  2.20856956707595E+12)
-X( 3) = (  2.40124166505483E+11, -1.96169118138118E+12)
-X( 4) = (  4.99892989998832E-01,  2.04829452506821E-03)
-
-X( 5) = (  2.28133972216688E-13, -5.22934777077988E-13)
-
-PATH NUMBER =       563
-
-ARCLEN =  1.36316796255539E+01
-NFE =  165
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.17049706412348E-13
-
-X( 1) = ( -4.20646520283670E+11,  6.35281134692192E+10)
-X( 2) = ( -1.47137551612478E+12, -4.97009378092599E+11)
-X( 3) = (  5.04046886898125E-01,  1.73415370809058E-03)
-X( 4) = ( -2.10255419797972E+11,  4.99312121049182E+11)
-
-X( 5) = (  3.94087865639159E-13, -4.40118373603443E-13)
-
-PATH NUMBER =       564
-
-ARCLEN =  4.38771799987325E+00
-NFE =  372
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998559800918E-01
-
-X( 1) = (  5.49767735257940E-01, -1.69916610105517E-01)
-X( 2) = ( -1.65334465306694E+00, -2.78319671184348E+00)
-X( 3) = (  9.10650740860331E-01,  1.66668775751798E-01)
-X( 4) = ( -7.13583968498739E-02,  2.60687264850087E-01)
-
-X( 5) = ( -1.42418709250787E-01, -2.13016340717264E-01)
-
-PATH NUMBER =       565
-
-ARCLEN =  2.26896711949266E+00
-NFE =  210
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.15602046492589E-14
-
-X( 1) = ( -3.20448527924676E+11,  1.47354515347988E+10)
-X( 2) = ( -7.14213371593667E+11,  5.30697516486158E+11)
-X( 3) = (  4.99231241222325E-01, -7.23463075690723E-05)
-X( 4) = (  1.35461371576275E+11,  4.76971751059870E+10)
-
-X( 5) = (  6.88724739131980E-13,  2.66076765655099E-14)
-
-PATH NUMBER =       566
-
-ARCLEN =  2.09277997218956E+00
-NFE =  186
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.68396821376919E-14
-
-X( 1) = ( -2.17089178864584E+10, -3.40044507055833E+11)
-X( 2) = ( -3.69588636855436E+11, -4.74824950163999E+11)
-X( 3) = (  4.99416285575935E-01,  1.25500694945276E-03)
-X( 4) = (  5.26857198953369E+10,  1.18801894496019E+11)
-
-X( 5) = (  1.02339415154057E-13, -8.33170175646575E-13)
-
-PATH NUMBER =       567
-
-ARCLEN =  2.08920417639323E+00
-NFE =  361
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999971721462E-01
-
-X( 1) = (  1.01752243867032E+01, -5.11020750298207E+00)
-X( 2) = (  7.75402399149940E+00, -1.67815041293472E+01)
-X( 3) = (  1.01362807240582E+00,  1.95192459223497E-02)
-X( 4) = (  7.63001862087542E-03,  1.13452344862424E-02)
-
-X( 5) = ( -2.25126879382040E-02, -1.51969449663962E-02)
-
-PATH NUMBER =       568
-
-ARCLEN =  1.14584278076626E+00
-NFE =  290
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95299943709695E-01
-
-X( 1) = (  7.19568398051739E-01,  3.50670349452377E-02)
-X( 2) = ( -3.79045448773882E-01, -7.52018286539122E-01)
-X( 3) = (  7.75866571884936E-01, -2.96767371660999E-01)
-X( 4) = ( -4.98954487081710E-01, -2.82314057848868E-01)
-
-X( 5) = ( -5.25122343704927E-01, -1.63124544170160E-01)
-
-PATH NUMBER =       569
-
-ARCLEN =  1.94839302815846E+00
-NFE =  288
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997840941215E-01
-
-X( 1) = (  1.38380640558018E+00,  2.31000111272037E-01)
-X( 2) = (  1.64215019016330E+00, -5.47402247372231E-01)
-X( 3) = (  1.84938829825863E+00,  3.83613634202933E-01)
-X( 4) = ( -5.66291283207761E-02, -1.18521343875806E-03)
-
-X( 5) = ( -1.57972687709645E-01,  4.25017091317687E-02)
-
-PATH NUMBER =       570
-
-ARCLEN =  2.30945337923816E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99955612958633E-01
-
-X( 1) = (  5.85464683464125E-01,  1.52250061064912E-01)
-X( 2) = (  6.38369947766816E-02, -6.01219659602345E-01)
-X( 3) = (  9.16382755431821E-01, -3.65379732704618E-01)
-X( 4) = ( -4.75171722360947E-01,  1.16752582083717E+00)
-
-X( 5) = ( -3.42359179952669E-01, -4.22682535425691E-02)
-
-PATH NUMBER =       571
-
-ARCLEN =  3.77654175430461E+00
-NFE =  226
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.44647831596929E-08
-
-X( 1) = (  9.10288395314071E-01, -2.44807597949909E-03)
-X( 2) = ( -1.18924875213154E+06,  6.32078782014288E+07)
-X( 3) = ( -1.77835794895239E+07, -4.64921295746894E+07)
-X( 4) = (  7.26490354337800E-02, -2.39938865661175E-02)
-
-X( 5) = (  1.30927514594141E-08, -1.07672425131693E-09)
-
-PATH NUMBER =       572
-
-ARCLEN =  2.36102627664635E+00
-NFE =  210
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93434775386109E-01
-
-X( 1) = (  6.74046023833176E-01,  1.19139398651479E-01)
-X( 2) = ( -4.36609180570219E-01, -9.52554531085939E-01)
-X( 3) = (  8.49245050063034E-01, -2.02088189442509E-01)
-X( 4) = ( -5.09510892996372E-01,  1.91477395943351E-03)
-
-X( 5) = ( -4.45133665430737E-01, -1.23555395094333E-01)
-
-PATH NUMBER =       573
-
-ARCLEN =  2.44266887027305E+01
-NFE =  245
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.06275938089699E-12
-
-X( 1) = (  1.44542012908950E+12,  8.32987408107275E+10)
-X( 2) = (  1.53609559575714E+12,  2.85931932702718E+12)
-X( 3) = (  4.59703864670059E-01, -2.69810626639481E-04)
-X( 4) = (  1.05332074325576E+12, -1.88912974264160E+11)
-
-X( 5) = ( -1.04983838462858E-13,  3.65295684326417E-13)
-
-PATH NUMBER =       574
-
-ARCLEN =  7.88907008833455E+00
-NFE =  418
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999754E-01
-
-X( 1) = (  2.10790168791636E-01,  5.15212778848224E-01)
-X( 2) = ( -6.40243039031668E+02, -2.85917408823346E+02)
-X( 3) = (  7.91596609060520E-01,  2.14353926011698E-01)
-X( 4) = ( -2.79249502253060E+01, -8.91087151368435E+01)
-
-X( 5) = (  6.21007501586602E-04, -1.07339509458884E-03)
-
-PATH NUMBER =       575
-
-ARCLEN =  2.64173041351576E+00
-NFE =  390
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98596699746709E-01
-
-X( 1) = (  6.93841454766597E-01, -9.84403266184327E-03)
-X( 2) = ( -4.05711222186325E-01, -1.44121516479273E+00)
-X( 3) = (  7.22760372204313E-01, -8.70953170953752E-02)
-X( 4) = ( -4.34783779042720E-01, -1.16689707239559E-01)
-
-X( 5) = ( -3.76757004200408E-01, -1.74796227643822E-01)
-
-PATH NUMBER =       576
-
-ARCLEN =  3.00788621081700E+00
-NFE =  456
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991812885468E-01
-
-X( 1) = (  5.96945227786234E-01, -2.31228628988336E-01)
-X( 2) = ( -4.01438952179618E+00, -2.71210502978944E+00)
-X( 3) = (  5.73592440915936E-01,  1.81539920674573E-01)
-X( 4) = ( -2.08013345240073E+00, -3.74982859646324E-01)
-
-X( 5) = (  1.79033681659215E-02, -2.64311509694827E-01)
-
-PATH NUMBER =       577
-
-ARCLEN =  1.51292671652235E+00
-NFE =  388
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99426735775909E-01
-
-X( 1) = (  7.26526242379237E-01, -2.98260132496996E-02)
-X( 2) = ( -2.55522030085596E-01, -1.82769599841490E+00)
-X( 3) = (  5.56065471719600E-01, -1.07496158106628E-01)
-X( 4) = ( -4.71331778427737E-01, -1.78771227299393E-01)
-
-X( 5) = ( -3.26030898046533E-01, -1.74102833029416E-01)
-
-PATH NUMBER =       578
-
-ARCLEN =  1.56212868142482E+00
-NFE =  347
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99700579595726E-01
-
-X( 1) = (  8.25867740058719E-01,  7.95367912117986E-02)
-X( 2) = ( -6.76488410167706E-01, -2.26889356292986E-01)
-X( 3) = (  1.00205872303104E+00, -3.41321087218936E-01)
-X( 4) = ( -4.26984209663176E-02, -4.23575442841404E-02)
-
-X( 5) = ( -5.43629542033997E-01, -2.37393333010615E-01)
-
-PATH NUMBER =       579
-
-ARCLEN =  3.18808804460647E+00
-NFE =  334
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.79037817848154E-06
-
-X( 1) = (  8.70398992996027E-01, -7.54217452979201E-02)
-X( 2) = ( -4.40487723049473E-02, -1.25766739809318E-01)
-X( 3) = (  2.80410348789264E+05, -2.91355202832054E+05)
-X( 4) = (  6.10534854614953E-01,  1.12568729634239E+00)
-
-X( 5) = ( -1.18669376076100E-06, -1.35726875884559E-06)
-
-PATH NUMBER =       580
-
-ARCLEN =  2.14543460760493E+00
-NFE =  536
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99977455096015E-01
-
-X( 1) = (  5.53252492032924E-01,  1.70712662193247E-01)
-X( 2) = (  2.31347209530814E-01, -6.85533998351565E-01)
-X( 3) = (  8.36460317897601E-01, -5.33940787503830E-01)
-X( 4) = ( -4.17686293753717E-01,  1.40796494193397E+00)
-
-X( 5) = ( -3.15816009652782E-01, -6.05913968405408E-02)
-
-PATH NUMBER =       581
-
-ARCLEN =  2.19549620517273E+00
-NFE =  282
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95670308655850E-01
-
-X( 1) = (  6.30213978211745E-01,  7.41775322876858E-02)
-X( 2) = ( -6.02120761192448E-01, -1.10566196316429E+00)
-X( 3) = (  7.46016130406248E-01, -2.63990754117085E-01)
-X( 4) = ( -9.01457378229985E-01, -4.94649991323817E-01)
-
-X( 5) = ( -5.29685902514540E-01, -1.93636055895575E-01)
-
-PATH NUMBER =       582
-
-ARCLEN =  7.35110293805673E+00
-NFE =  339
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.29143814754407E-07
-
-X( 1) = (  6.93565119334877E+06,  1.39164975505683E+06)
-X( 2) = ( -9.70084687953107E+05,  5.79060383431807E+06)
-X( 3) = (  9.30805595396588E-01,  1.61706219599307E-02)
-X( 4) = (  7.66272886668617E-02,  3.20756042406227E-02)
-
-X( 5) = ( -1.77338576284029E-07,  9.99791427122631E-08)
-
-PATH NUMBER =       583
-
-ARCLEN =  3.66790279482254E+00
-NFE =  262
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84413311272238E-01
-
-X( 1) = ( -1.25074331698830E-02, -2.48896297248412E-02)
-X( 2) = ( -2.15204587294722E+00, -1.16387961034864E+00)
-X( 3) = (  9.98513512532105E-01, -4.43744452252762E-03)
-X( 4) = ( -1.59913818530475E+00,  4.90833258559734E-01)
-
-X( 5) = ( -3.29367736915009E-01, -7.24097706164058E-01)
-
-PATH NUMBER =       584
-
-ARCLEN =  2.09223819338904E+00
-NFE =  290
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84217102838177E-01
-
-X( 1) = (  3.87246470580976E-01,  3.71549684010150E-01)
-X( 2) = ( -1.36731559202450E+00, -1.07607552977850E+00)
-X( 3) = (  8.53293398322140E-01, -2.65828801908397E-02)
-X( 4) = ( -1.29630392316161E+00, -4.19719344017773E-01)
-
-X( 5) = ( -8.80246230117655E-01, -1.08210570933193E-01)
-
-PATH NUMBER =       585
-
-ARCLEN =  3.15563450159416E+00
-NFE =  500
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99927976002925E-01
-
-X( 1) = (  5.82458577870908E-01,  1.71278894426522E-01)
-X( 2) = ( -2.29754723248644E+00, -2.04002582367824E+00)
-X( 3) = (  6.33394466971354E-01, -2.58208653075382E-01)
-X( 4) = ( -1.91632418801330E+00, -6.63705159165916E-01)
-
-X( 5) = ( -1.84792064420910E-01, -4.26777179114729E-01)
-
-PATH NUMBER =       586
-
-ARCLEN =  3.42413889223984E+00
-NFE =  529
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99973159419427E-01
-
-X( 1) = (  2.36023206555175E-01,  8.42821219267641E-01)
-X( 2) = (  1.73692790949979E-01, -2.50503058768257E+00)
-X( 3) = (  6.35245154435748E-01,  1.00038675260201E-02)
-X( 4) = (  3.21226800595231E-01, -2.19453614602296E+00)
-
-X( 5) = ( -5.05284010607272E-01,  2.01930633995667E-02)
-
-PATH NUMBER =       587
-
-ARCLEN =  1.65975796963347E+00
-NFE =  434
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98747316320260E-01
-
-X( 1) = (  7.31109307364086E-01,  8.66356183766843E-02)
-X( 2) = (  6.57243781893165E-01, -6.11868531218083E-01)
-X( 3) = (  3.16947085715630E-01, -8.61662930696168E-01)
-X( 4) = ( -4.10777437033457E-01,  2.07535820204785E-01)
-
-X( 5) = ( -4.34941784940404E-01, -9.96020218532026E-02)
-
-PATH NUMBER =       588
-
-ARCLEN =  1.85593110935921E+00
-NFE =  395
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99586227994465E-01
-
-X( 1) = (  6.57562504496708E-01,  1.76192337609541E-01)
-X( 2) = (  6.51556779479176E-01, -6.15601254214460E-01)
-X( 3) = (  4.10726349209232E-01, -9.08099683946251E-01)
-X( 4) = ( -4.68866924514751E-01,  5.58328024654244E-01)
-
-X( 5) = ( -3.89975835698694E-01, -7.70376943307711E-02)
-
-PATH NUMBER =       589
-
-ARCLEN =  2.59308592346851E+00
-NFE =  293
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999976E-01
-
-X( 1) = ( -1.00642879997434E+02,  1.05975707464163E+02)
-X( 2) = ( -3.35766655411704E-01,  1.43700573964697E-01)
-X( 3) = (  8.76819378052894E-01,  4.67168426971866E-02)
-X( 4) = (  4.51518659210571E+01,  5.21502329188048E+00)
-
-X( 5) = (  2.33146390967553E-03,  4.99324410952428E-03)
-
-PATH NUMBER =       590
-
-ARCLEN =  2.04874937611418E+00
-NFE =  356
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96000220951316E-01
-
-X( 1) = (  5.23950310723867E-01,  5.34387578620259E-01)
-X( 2) = (  3.65684616427526E-01, -2.51731164828047E-01)
-X( 3) = (  1.11304910966194E+00, -3.34217726566509E-01)
-X( 4) = ( -5.98332742913517E-01, -8.45348776238040E-01)
-
-X( 5) = ( -3.28049392811386E-01,  1.95069689781896E-01)
-
-PATH NUMBER =       591
-
-ARCLEN =  1.30965259362005E+01
-NFE =  431
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99987145932194E-01
-
-X( 1) = (  1.56180932635634E+00, -1.20536238750527E+00)
-X( 2) = (  1.13110230937464E+00, -1.31678472714813E-01)
-X( 3) = ( -5.74552664246350E-02, -5.88713962957243E-02)
-X( 4) = (  3.34133360107666E-01,  2.24161857835679E-01)
-
-X( 5) = ( -3.95519695972964E-01, -2.20388648308372E-01)
-
-PATH NUMBER =       592
-
-ARCLEN =  2.57290524864000E+00
-NFE =  255
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87177160308413E-01
-
-X( 1) = ( -2.74719835132285E-02, -2.62976793913807E-02)
-X( 2) = ( -8.89429864429765E-01, -1.35226396787305E+00)
-X( 3) = (  1.00494875220548E+00,  5.09826567038780E-03)
-X( 4) = ( -1.78394257365136E+00,  3.82199016698554E-02)
-
-X( 5) = ( -6.20331751144921E-01, -4.98311132985196E-02)
-
-PATH NUMBER =       593
-
-ARCLEN =  5.90164713514704E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995237638403E-01
-
-X( 1) = ( -2.98287140633071E-02,  6.58847081233125E-02)
-X( 2) = ( -3.17463325121606E+00, -6.73675034346574E+00)
-X( 3) = (  9.59466456750045E-01,  2.11319846467053E-02)
-X( 4) = ( -3.55841284333152E+00, -2.97043233311106E+00)
-
-X( 5) = ( -8.35189620259968E-02, -1.65652102656204E-01)
-
-PATH NUMBER =       594
-
-ARCLEN =  2.53617691584421E+00
-NFE =  351
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999784674927E-01
-
-X( 1) = (  4.59313719842210E-01, -2.93472124028130E-01)
-X( 2) = (  7.03802348595775E+00, -2.88346266077237E+00)
-X( 3) = (  4.64803268732677E-01,  1.92919074138979E-01)
-X( 4) = (  1.35024112139180E+00, -3.94216328942732E+00)
-
-X( 5) = ( -1.17227750024926E-01,  6.15320316737793E-02)
-
-PATH NUMBER =       595
-
-ARCLEN =  6.76032557373059E+00
-NFE =  563
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999993E-01
-
-X( 1) = ( -1.68263488326908E-01,  1.03958783402860E-01)
-X( 2) = (  3.32222010306012E+00, -1.11990457702859E+02)
-X( 3) = (  8.76037459490616E-01,  1.01310562210141E-01)
-X( 4) = (  5.52071320468519E-01, -6.58406964578681E-02)
-
-X( 5) = ( -5.07408547801882E-03, -5.68535340816030E-03)
-
-PATH NUMBER =       596
-
-ARCLEN =  1.40847329175134E+00
-NFE =  440
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99073424509766E-01
-
-X( 1) = (  5.54947022926009E-01,  6.32159055013937E-01)
-X( 2) = (  4.84077010250540E-01, -3.59039192399436E-01)
-X( 3) = (  9.05538309763326E-01, -6.82527254567535E-01)
-X( 4) = ( -4.13781485792052E-01, -9.14713959818130E-01)
-
-X( 5) = ( -3.98120881846647E-01,  1.66211838306590E-01)
-
-PATH NUMBER =       597
-
-ARCLEN =  1.94128484201465E+00
-NFE =  213
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.89044755950366E-12
-
-X( 1) = (  8.23664053492384E+10,  4.03197024717791E+10)
-X( 2) = (  5.05510614250848E-01, -2.77475232008276E-01)
-X( 3) = (  6.22926067142689E+10, -4.62193405874712E+10)
-X( 4) = ( -6.77942605718378E+10, -3.15761595883645E+10)
-
-X( 5) = ( -4.73566308780218E-12, -3.99630957666208E-13)
-
-PATH NUMBER =       598
-
-ARCLEN =  2.91113310490728E+00
-NFE =  284
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.15704683989607E-07
-
-X( 1) = ( -1.41295198722572E+06,  2.64501031552039E+06)
-X( 2) = (  4.52966755998055E-01,  1.01218305402425E-01)
-X( 3) = (  7.82461017038531E-01, -8.63693205859839E-01)
-X( 4) = (  1.30942573009367E+06, -2.46406167640676E+06)
-
-X( 5) = (  9.64156647140137E-08,  1.98617906864863E-07)
-
-PATH NUMBER =       599
-
-ARCLEN =  3.27995909803378E+00
-NFE =  401
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999884363115E-01
-
-X( 1) = ( -4.20561793779774E+00,  7.94197638418283E-01)
-X( 2) = (  3.27950025772300E-01, -1.04869015742959E+00)
-X( 3) = (  5.63234322642521E-01, -6.02006947833220E-02)
-X( 4) = (  6.75267434402626E-01,  7.65454104905580E-01)
-
-X( 5) = (  1.74782956272983E-01,  1.54758696531545E-01)
-
-PATH NUMBER =       600
-
-ARCLEN =  4.24326794268411E+00
-NFE =  223
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.19643890139942E-08
-
-X( 1) = (  6.46895665729467E+07, -1.88862507540988E+07)
-X( 2) = (  4.78167194151710E-01, -2.78692929115044E-01)
-X( 3) = ( -6.91752524507974E+07,  3.50776634974962E+07)
-X( 4) = (  4.96375050324336E+07, -3.56245424025557E+07)
-
-X( 5) = (  1.54662675488416E-08, -6.87999745873193E-09)
-
-PATH NUMBER =       601
-
-ARCLEN =  3.73969805246479E+00
-NFE =  287
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999978541E-01
-
-X( 1) = ( -5.75882658919005E-02,  6.66902843890080E-03)
-X( 2) = (  5.55095955404139E-01, -3.34593738096285E-01)
-X( 3) = (  9.38268943496982E-01,  2.70910251604905E-02)
-X( 4) = ( -8.70195255903032E+00, -5.55557169879348E+00)
-
-X( 5) = ( -1.73966233986454E-02,  1.37291891850873E-01)
-
-PATH NUMBER =       602
-
-ARCLEN =  1.11912810358467E+01
-NFE =  308
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999166E-01
-
-X( 1) = (  8.76382280939827E-01, -1.33422580292475E-02)
-X( 2) = (  1.63095725731402E+02,  2.94780532681585E+02)
-X( 3) = ( -3.73327866643111E-01, -1.28026348478613E-01)
-X( 4) = ( -3.24621769209379E+01,  2.55608269267094E+01)
-
-X( 5) = (  3.13369176817400E-04,  2.46232254507142E-03)
-
-PATH NUMBER =       603
-
-ARCLEN =  2.67480186341968E+00
-NFE =  258
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95675194416090E-01
-
-X( 1) = ( -2.84426986698740E-02,  4.16526214129541E-02)
-X( 2) = (  2.11371977573319E-01, -1.01614146963808E+00)
-X( 3) = (  9.96483523327055E-01, -2.77517201548022E-02)
-X( 4) = ( -3.31633891677387E-01, -1.21077877725209E+00)
-
-X( 5) = ( -6.30123237441856E-01,  2.89506209671856E-01)
-
-PATH NUMBER =       604
-
-ARCLEN =  1.66111236004033E+00
-NFE =  250
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98787953888876E-01
-
-X( 1) = ( -1.22746019118171E-02,  6.12990637851670E-02)
-X( 2) = (  2.59511754753190E-01, -4.91865070124363E-01)
-X( 3) = (  1.02396105298292E+00, -4.26577807547653E-02)
-X( 4) = (  2.69453191878390E-01, -9.16671252388096E-01)
-
-X( 5) = ( -6.62039149507509E-01,  4.56079319428228E-01)
-
-PATH NUMBER =       605
-
-ARCLEN =  2.18978987995623E+00
-NFE =  184
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.55054554006084E-12
-
-X( 1) = ( -2.99215940181896E+09, -9.28703246653599E+09)
-X( 2) = (  5.02172276077055E-01, -2.99677336121355E-01)
-X( 3) = ( -2.27137764654112E+10,  1.10300529791257E+10)
-X( 4) = (  1.07217597261658E+08,  1.38425515717786E+10)
-
-X( 5) = (  3.10621323042388E-11,  2.72151854004143E-12)
-
-PATH NUMBER =       606
-
-ARCLEN =  1.68853999737361E+00
-NFE =  388
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99705704484434E-01
-
-X( 1) = (  1.34202148579780E-01,  1.00088077720926E+00)
-X( 2) = ( -1.25048443783019E-01,  3.29711352255208E-01)
-X( 3) = (  9.18322201829578E-01,  5.42850350324425E-02)
-X( 4) = (  5.74680908425171E-01, -7.21940019972097E-01)
-
-X( 5) = ( -1.25018608959864E-01,  4.20363069674314E-01)
-
-PATH NUMBER =       607
-
-ARCLEN =  4.39130167699772E+00
-NFE =  315
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.16374010585721E-06
-
-X( 1) = (  3.94590076101493E+05, -2.67381810719161E+05)
-X( 2) = ( -1.16349814168727E+00, -3.99426727788657E-01)
-X( 3) = (  7.36589039087658E-01,  8.58453491180466E-03)
-X( 4) = ( -3.76726166134324E+05, -6.41888572670792E+04)
-
-X( 5) = ( -1.45276638614274E-06, -1.17913536328023E-06)
-
-PATH NUMBER =       608
-
-ARCLEN =  4.65677537636837E+00
-NFE =  516
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99993207445669E-01
-
-X( 1) = ( -5.90692698753065E-01, -5.68108037976257E-01)
-X( 2) = ( -5.55559579234613E-01, -3.18671120710502E-02)
-X( 3) = (  1.76162885517788E+00,  1.29643637784587E+00)
-X( 4) = (  8.69056612447675E-01, -8.30520327393039E-03)
-
-X( 5) = ( -1.71765805769517E-01,  7.53314417127015E-01)
-
-PATH NUMBER =       609
-
-ARCLEN =  1.16001719883425E+01
-NFE =  241
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.33161939269596E-08
-
-X( 1) = (  1.34049428686501E+07, -3.76304488426689E+07)
-X( 2) = ( -2.24096905465362E+00,  4.29457537101829E-02)
-X( 3) = (  6.30678837362282E-01, -2.53778952787732E-03)
-X( 4) = ( -1.29423335097566E+07,  3.52982422140652E+07)
-
-X( 5) = ( -5.05241559960873E-09, -1.58216106377253E-08)
-
-PATH NUMBER =       610
-
-ARCLEN =  2.63441828258314E+01
-NFE =  372
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96692370862345E-01
-
-X( 1) = (  8.06770037903074E-01, -1.58844716754188E-01)
-X( 2) = (  9.86486048795673E-01,  3.75786239955557E-01)
-X( 3) = ( -2.33138980696655E-01, -1.62519605615953E-01)
-X( 4) = ( -1.21899440095804E-01,  4.60476431392577E-01)
-
-X( 5) = ( -4.71312099510230E-01,  4.75848255470509E-01)
-
-PATH NUMBER =       611
-
-ARCLEN =  3.44493084731274E+01
-NFE =  598
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99759265972946E-01
-
-X( 1) = ( -5.58649673982056E-01, -9.67780676336092E-01)
-X( 2) = (  1.91686192771519E-01, -9.15665710916300E-01)
-X( 3) = (  8.52973417688354E-01,  8.05065972423705E-02)
-X( 4) = ( -3.14112339106586E-01, -6.22485179294830E-01)
-
-X( 5) = ( -1.03425213704412E+00, -2.88522639695940E+00)
-
-PATH NUMBER =       612
-
-ARCLEN =  5.19609174619541E+00
-NFE =  230
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.70017152203171E-01
-
-X( 1) = ( -1.62997714285191E-01, -1.08943930158053E-01)
-X( 2) = ( -4.57615846529866E-01, -7.94052026137232E-01)
-X( 3) = (  9.29389003093663E-01,  1.67488633216691E-02)
-X( 4) = ( -1.36143979133716E-01, -7.88651493085862E-01)
-
-X( 5) = ( -2.68137411957119E+00,  2.47752284548205E-01)
-
-PATH NUMBER =       613
-
-ARCLEN =  4.10864763323353E+00
-NFE =  404
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95965077054571E-01
-
-X( 1) = (  2.41902176685865E-01, -5.55698608402172E-04)
-X( 2) = (  3.86370593908741E-02, -4.06796139932869E-01)
-X( 3) = (  9.20913863171007E-01,  3.41458518337002E-02)
-X( 4) = ( -4.70315121487865E-02, -7.21675855350631E-01)
-
-X( 5) = ( -6.86469054742444E-01,  3.91416623133985E-01)
-
-PATH NUMBER =       614
-
-ARCLEN =  2.21800867427920E+00
-NFE =  270
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99409002555213E-01
-
-X( 1) = ( -5.26279340399802E-02,  1.07674866808959E-01)
-X( 2) = ( -2.86784179761977E-03, -1.44409461467475E-01)
-X( 3) = (  1.04742745179593E+00,  9.08621838131696E-03)
-X( 4) = (  6.25527867515705E-01, -4.29758620440144E-01)
-
-X( 5) = ( -7.64596574446426E-01,  7.10923737705985E-01)
-
-PATH NUMBER =       615
-
-ARCLEN =  2.05317156610866E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95613869419829E-01
-
-X( 1) = ( -2.27708532871379E-01,  5.17477790670720E-01)
-X( 2) = ( -9.07102533087118E-02,  2.79264857309631E-01)
-X( 3) = (  9.68117664256184E-01, -3.55757857213240E-02)
-X( 4) = (  6.22582787196455E-01, -4.75725532264156E-01)
-
-X( 5) = ( -7.33532454867503E-02,  6.40829632125742E-01)
-
-PATH NUMBER =       616
-
-ARCLEN =  7.88049485568746E+00
-NFE =  259
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.74207925199179E-13
-
-X( 1) = (  8.65083244786860E+12, -5.06004762977872E+12)
-X( 2) = (  1.45019642784640E+13,  1.76377747927025E+13)
-X( 3) = ( -1.41333606717937E+13, -1.38280771036676E+13)
-X( 4) = (  5.05386958252370E-01, -4.81865308072455E-03)
-
-X( 5) = (  7.84306430565151E-14, -1.50480756327953E-14)
-
-PATH NUMBER =       617
-
-ARCLEN =  5.27359587973673E+00
-NFE =  263
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.35877860534252E-06
-
-X( 1) = ( -1.30214118414906E-01, -4.95195029557320E-02)
-X( 2) = (  3.67636766357183E+06, -7.74431334416174E+05)
-X( 3) = ( -1.93048048912742E+06,  1.43517952000595E+06)
-X( 4) = (  8.94172388036537E-01, -2.81808466400428E-03)
-
-X( 5) = ( -7.11936504486563E-08,  2.17823319711020E-07)
-
-PATH NUMBER =       618
-
-ARCLEN =  4.56435570817601E+00
-NFE =  375
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972831480277E-01
-
-X( 1) = ( -8.01489370049100E-01, -1.03183846193578E+00)
-X( 2) = (  2.59313179161371E-01,  1.99875116816795E-01)
-X( 3) = (  7.72100705971076E-01, -2.99114850737172E-02)
-X( 4) = ( -4.03662335476349E-01,  2.10555700766859E-01)
-
-X( 5) = (  9.86479806783597E-01,  7.30476317206544E-01)
-
-PATH NUMBER =       619
-
-ARCLEN =  3.96096726085171E+00
-NFE =  448
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999363166592E-01
-
-X( 1) = ( -2.74117709696939E+00, -3.37230816541240E+00)
-X( 2) = ( -3.43883100842357E+00, -1.65089398597546E+00)
-X( 3) = (  5.67925804390629E-01,  1.91207480110855E-01)
-X( 4) = (  5.76821073121913E-01, -2.78979702642602E-01)
-
-X( 5) = (  8.31667364514129E-02, -6.87496277564696E-02)
-
-PATH NUMBER =       620
-
-ARCLEN =  5.54766708065553E+01
-NFE =  679
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999792E-01
-
-X( 1) = ( -4.96111833629764E-02,  3.58230289205751E-02)
-X( 2) = ( -3.49797031392359E+00, -1.94780574773727E+00)
-X( 3) = (  9.67797936647727E-01,  7.63408139615411E-03)
-X( 4) = (  1.64547695525482E+01, -4.72464428441307E+01)
-
-X( 5) = (  3.27501026257559E-02,  4.80512902554809E-04)
-
-PATH NUMBER =       621
-
-ARCLEN =  2.50135922591940E+02
-NFE =  570
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999050E-01
-
-X( 1) = (  1.08110619935308E-01,  3.42803206300101E-02)
-X( 2) = (  6.61961203409237E+02, -3.48549960660357E+02)
-X( 3) = ( -2.03854641730110E+02,  3.58692271180869E+02)
-X( 4) = (  9.14028563265712E-01,  4.46826111437254E-03)
-
-X( 5) = ( -7.22952168177224E-04,  8.21357356341100E-04)
-
-PATH NUMBER =       622
-
-ARCLEN =  1.02063582172397E+01
-NFE =  212
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.69021280139017E-01
-
-X( 1) = (  7.84069070943038E-02, -1.66822683940539E-01)
-X( 2) = ( -5.25299277036395E-01, -3.11278233048683E-01)
-X( 3) = (  7.82294995384072E-01,  2.82554852283606E-02)
-X( 4) = (  1.21869550217387E-01, -4.19937016166533E-01)
-
-X( 5) = ( -6.89261973970946E+00,  8.37259199106880E-02)
-
-PATH NUMBER =       623
-
-ARCLEN =  2.48063893791043E+00
-NFE =  247
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98376374149089E-01
-
-X( 1) = (  3.18189200526238E-01, -4.14353424541129E-03)
-X( 2) = ( -2.51040533984580E-01, -1.26183096859595E-01)
-X( 3) = (  9.55452995680243E-01, -3.14639370818995E-02)
-X( 4) = (  2.83487546004092E-01, -3.02321251506334E-01)
-
-X( 5) = ( -1.04104407593044E+00,  2.72279281306085E-01)
-
-PATH NUMBER =       624
-
-ARCLEN =  2.44809444891154E+00
-NFE =  374
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97584245533907E-01
-
-X( 1) = (  1.55468817938826E-01,  2.85067828501417E-01)
-X( 2) = ( -2.86683790583413E-01,  3.39076258864574E-01)
-X( 3) = (  1.00448537831627E+00, -3.16486655293668E-02)
-X( 4) = (  4.56470445082547E-01, -2.57882313235112E-01)
-
-X( 5) = ( -4.24682603007801E-01,  7.99353172844888E-01)
-
-PATH NUMBER =       625
-
-ARCLEN =  3.34047275216473E+00
-NFE =  341
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95381419177179E-01
-
-X( 1) = ( -3.08606522601682E-01,  6.92855269066506E-01)
-X( 2) = ( -1.09326444071824E+00,  4.85875719988828E-01)
-X( 3) = (  8.66985781956503E-01,  1.49223059643586E-01)
-X( 4) = (  6.03310751920720E-01, -1.01604144041769E-01)
-
-X( 5) = (  3.06335374610757E-01,  5.32657968866668E-01)
-
-PATH NUMBER =       626
-
-ARCLEN =  4.87281324760866E+01
-NFE =  568
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.44044495009921E-10
-
-X( 1) = ( -1.55749221547920E+00, -1.15604042237863E-01)
-X( 2) = ( -5.98298412793350E+09,  1.94259960051203E+09)
-X( 3) = (  6.81085758819109E+09, -3.40089097895559E+09)
-X( 4) = (  6.30507140426776E-01, -4.99376157484420E-04)
-
-X( 5) = ( -3.37441077413302E-11, -1.18017511778826E-10)
-
-PATH NUMBER =       627
-
-ARCLEN =  1.62603240670953E+01
-NFE =  458
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999909E-01
-
-X( 1) = ( -5.51507884649289E+01, -9.01716668446057E+01)
-X( 2) = (  1.27682289956515E-01,  1.87545377400846E-01)
-X( 3) = (  9.74897259687918E-01, -7.94952824615755E-02)
-X( 4) = ( -5.59153693744565E-01,  1.56754756614317E+02)
-
-X( 5) = (  2.09987097311637E-03, -7.49632760795300E-03)
-
-PATH NUMBER =       628
-
-ARCLEN =  2.67950863356669E+01
-NFE =  275
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.71264835722115E-01
-
-X( 1) = ( -1.62985317071206E-01, -9.00016154899773E-02)
-X( 2) = ( -5.17318893210624E-01, -4.65478426032725E-01)
-X( 3) = (  8.14570329682934E-01,  1.41060861894606E-01)
-X( 4) = (  3.89193017980037E-01, -3.34699413216244E-01)
-
-X( 5) = ( -3.84642872883506E+00,  1.02472887503243E+01)
-
-PATH NUMBER =       629
-
-ARCLEN =  1.09972719330413E+01
-NFE =  264
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.04755714879673E-08
-
-X( 1) = (  8.24161199930265E-02, -7.61671533189156E-03)
-X( 2) = (  1.93868060773275E+05, -7.74830838287320E+06)
-X( 3) = (  2.14489064184768E+06,  5.71340422063342E+06)
-X( 4) = (  9.11152942114895E-01, -7.69758720495479E-04)
-
-X( 5) = ( -1.06734856319393E-07,  9.44455489591258E-09)
-
-PATH NUMBER =       630
-
-ARCLEN =  1.77564118744153E+01
-NFE =  398
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.73150207787052E-01
-
-X( 1) = ( -2.41559410971518E-02, -1.30793327607420E-01)
-X( 2) = ( -7.00444883032418E-01, -2.22757987811483E-01)
-X( 3) = (  7.74098748075555E-01,  4.81658802854344E-02)
-X( 4) = (  1.36055150880226E-01, -4.27659857834489E-01)
-
-X( 5) = (  4.27446033070341E+00,  1.55439583651571E+00)
-
-PATH NUMBER =       631
-
-ARCLEN =  2.17790961277228E+00
-NFE =  317
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99810848128133E-01
-
-X( 1) = (  3.84241921120677E-01, -3.55066218571854E-01)
-X( 2) = ( -1.38952554115412E+00, -6.06314202166673E-01)
-X( 3) = (  7.77645716853888E-01,  4.50832119101932E-02)
-X( 4) = (  8.27738344705242E-02, -2.51107093393930E-01)
-
-X( 5) = (  2.29163220685062E-02, -7.56511389704668E-01)
-
-PATH NUMBER =       632
-
-ARCLEN =  1.76939068040559E+00
-NFE =  342
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99773110720273E-01
-
-X( 1) = (  7.15523435278344E-01, -8.55523437567544E-02)
-X( 2) = ( -4.01103650622111E-01, -4.43400138170319E-01)
-X( 3) = (  9.90174345345501E-01, -5.86708089517400E-02)
-X( 4) = (  5.73945441173954E-02,  3.09507073232912E-03)
-
-X( 5) = ( -5.36594920631456E-01, -1.51816360971095E-01)
-
-PATH NUMBER =       633
-
-ARCLEN =  2.94304462731698E+00
-NFE =  248
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97982164984983E-01
-
-X( 1) = (  4.56045070973567E-01,  1.65716105918232E-01)
-X( 2) = ( -4.70440045855834E-01, -5.71716158387162E-02)
-X( 3) = (  1.02961238169015E+00,  8.07998382690743E-03)
-X( 4) = (  1.94004299935976E-01,  1.24457500529855E-02)
-
-X( 5) = ( -7.81917315622644E-01,  1.82255313433019E-01)
-
-PATH NUMBER =       634
-
-ARCLEN =  5.47634090158112E+00
-NFE =  389
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96136949414807E-01
-
-X( 1) = (  6.30523603525651E-02,  5.85282866962856E-01)
-X( 2) = ( -9.00114581154144E-01,  4.95302474734026E-01)
-X( 3) = (  9.28991180439500E-01,  7.99016726504187E-02)
-X( 4) = (  4.83269495438030E-01,  1.58136383348489E-02)
-
-X( 5) = (  4.51006773917832E-02,  8.62722342367264E-01)
-
-PATH NUMBER =       635
-
-ARCLEN =  9.14598166968036E+00
-NFE =  198
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.69077651935178E-01
-
-X( 1) = ( -1.54606692079542E-01,  2.69283219378731E-01)
-X( 2) = ( -9.29408422619158E-01,  6.14964863629503E-01)
-X( 3) = (  1.02485071998300E+00, -2.76728809873133E-03)
-X( 4) = (  2.66208004463876E-01,  4.98814375202063E-01)
-
-X( 5) = (  2.52654209659508E-01,  1.14608059544866E+00)
-
-PATH NUMBER =       636
-
-ARCLEN =  4.39428384286845E+01
-NFE =  290
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.74821327379613E-01
-
-X( 1) = ( -3.01880690951332E-01, -3.19441334400597E-01)
-X( 2) = ( -1.17233803448811E+00,  1.10898592418811E-01)
-X( 3) = (  9.26368497858623E-01, -2.93647869089021E-05)
-X( 4) = ( -4.32664626168614E-01,  1.01508442658569E+00)
-
-X( 5) = (  2.26869546841150E+00, -2.39616725568612E+00)
-
-PATH NUMBER =       637
-
-ARCLEN =  7.22255349682931E+00
-NFE =  206
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.70726152611976E-14
-
-X( 1) = (  1.32092177511778E+12, -1.99589590459263E+12)
-X( 2) = (  4.47232327995168E+12, -6.22547251900308E+12)
-X( 3) = ( -1.78575968213796E+12,  2.27010008059087E+12)
-X( 4) = (  4.90432613649369E-01,  7.95297816073329E-04)
-
-X( 5) = ( -1.29447369707006E-13, -4.26653070512151E-14)
-
-PATH NUMBER =       638
-
-ARCLEN =  7.57528137261860E+00
-NFE =  277
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98212607273892E-01
-
-X( 1) = (  1.39899523662133E-01, -1.83843653508090E-01)
-X( 2) = ( -5.94910474124442E-01, -6.87281963733131E-01)
-X( 3) = (  6.44483049396986E-01,  1.19262584232379E-01)
-X( 4) = (  4.89020975219011E-01, -7.04911958923782E-02)
-
-X( 5) = ( -7.06872513911283E-01, -1.26427801972082E+00)
-
-PATH NUMBER =       639
-
-ARCLEN =  3.44945797289285E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999959518476E-01
-
-X( 1) = ( -4.47183332539529E+00, -1.05860535559955E+01)
-X( 2) = ( -1.47163053673467E+01, -5.29819389074180E+00)
-X( 3) = (  9.66197720496671E-01,  8.17277168441438E-03)
-X( 4) = ( -3.75389525327002E-02,  1.86409717838143E-02)
-
-X( 5) = (  1.87534428582073E-02, -2.42697144477547E-02)
-
-PATH NUMBER =       640
-
-ARCLEN =  1.35879976330780E+00
-NFE =  346
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99569622926592E-01
-
-X( 1) = (  8.03377980669122E-01, -2.71330015345043E-01)
-X( 2) = ( -1.60773904372631E-01, -1.20194584040311E+00)
-X( 3) = (  6.92550755571228E-01,  1.58949661608123E-02)
-X( 4) = ( -3.73325512959797E-01, -1.26587633656054E-01)
-
-X( 5) = ( -3.95432148889649E-01, -1.62753981250584E-01)
-
-PATH NUMBER =       641
-
-ARCLEN =  1.41187786952877E+00
-NFE =  299
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96018260156889E-01
-
-X( 1) = (  8.49273411822847E-01,  8.66105320458846E-02)
-X( 2) = ( -3.31878468140433E-01, -3.23367577082909E-01)
-X( 3) = (  8.19969362773397E-01, -2.92553388807572E-01)
-X( 4) = ( -4.05758361990391E-01, -1.41839004749357E-03)
-
-X( 5) = ( -5.35170358871192E-01, -7.17148769287442E-02)
-
-PATH NUMBER =       642
-
-ARCLEN =  2.11244684031875E+00
-NFE =  337
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95387498108407E-01
-
-X( 1) = (  4.42700387193129E-01,  3.50976035601803E-01)
-X( 2) = ( -5.74231423745982E-01, -1.05366416654016E-01)
-X( 3) = (  1.01488662917178E+00, -1.85242104746236E-03)
-X( 4) = (  1.13694312868845E-02,  3.64553941603005E-01)
-
-X( 5) = ( -6.39738158532885E-01,  1.72038217410786E-01)
-
-PATH NUMBER =       643
-
-ARCLEN =  7.67280327765763E+00
-NFE =  207
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.08232983585047E-14
-
-X( 1) = ( -2.37894546629458E+12, -1.71606691474754E+11)
-X( 2) = ( -8.69457377957378E+11, -3.39853715956765E+12)
-X( 3) = ( -1.93272531865419E+12,  1.18701423805768E+12)
-X( 4) = (  4.93065167451733E-01,  1.08051024914769E-03)
-
-X( 5) = (  2.44447989411131E-13, -5.44875017501056E-14)
-
-PATH NUMBER =       644
-
-ARCLEN =  4.37913128589595E+00
-NFE =  563
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99602736091125E-01
-
-X( 1) = (  7.06787138488513E-01,  2.20244849317216E-02)
-X( 2) = ( -4.81808460109861E-01, -9.70125983742661E-01)
-X( 3) = (  9.58040862009689E-01, -1.45265592297272E-01)
-X( 4) = ( -2.17316692447881E-01, -9.45854080094663E-02)
-
-X( 5) = ( -4.16679299496793E-01, -1.66937508759014E-01)
-
-PATH NUMBER =       645
-
-ARCLEN =  2.38925985604303E+01
-NFE =  253
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.69264724123937E-01
-
-X( 1) = ( -7.91703148593468E-02, -2.79774041415792E-02)
-X( 2) = ( -1.62101868177154E+00,  1.29142077964294E-01)
-X( 3) = (  9.96285501663860E-01,  2.34532713676253E-03)
-X( 4) = ( -6.26320867243403E-01,  1.02489068904984E+00)
-
-X( 5) = (  8.18171268711596E-01, -4.93156361007240E+00)
-
-PATH NUMBER =       646
-
-ARCLEN =  9.98778092594089E+00
-NFE =  347
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.14091191194447E-09
-
-X( 1) = ( -4.11321453256606E+05, -3.55729256260239E+06)
-X( 2) = ( -4.98690064847891E+06, -1.41666164076890E+07)
-X( 3) = (  7.43112548205575E-01,  6.58704009114276E-03)
-X( 4) = ( -5.91057783794189E-01,  4.21986093703452E-02)
-
-X( 5) = ( -8.10898547585364E-09, -4.66656928722105E-08)
-
-PATH NUMBER =       647
-
-ARCLEN =  4.72649485485088E+00
-NFE =  454
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98530113351678E-01
-
-X( 1) = (  3.62404481614398E-01,  1.08873328437001E-01)
-X( 2) = ( -8.23713900129912E-01, -5.54671256507465E-01)
-X( 3) = (  6.79549671182964E-01, -2.20761366150820E-02)
-X( 4) = (  1.97945626368323E-01,  1.00211942375128E-01)
-
-X( 5) = ( -9.59709313364534E-01, -6.98462293542158E-01)
-
-PATH NUMBER =       648
-
-ARCLEN =  2.45663700357776E+00
-NFE =  219
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999093E-01
-
-X( 1) = (  4.64383581275281E-01, -3.95129195347033E-01)
-X( 2) = ( -6.32343674233131E+01, -3.74030569257722E+02)
-X( 3) = (  6.05653758944633E-01,  2.90591840402873E-01)
-X( 4) = (  4.15238876859860E+01, -3.57874214708112E+01)
-
-X( 5) = ( -9.89017187151804E-04, -2.03218791163545E-03)
-
-PATH NUMBER =       649
-
-ARCLEN =  1.21088894708170E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92971273432087E-01
-
-X( 1) = (  8.18765525655990E-01, -7.52230480537598E-02)
-X( 2) = ( -2.28298107130418E-01, -7.51969031016507E-01)
-X( 3) = (  6.50767826488490E-01, -1.33441357103914E-01)
-X( 4) = ( -5.12790636010790E-01, -2.22801051491305E-01)
-
-X( 5) = ( -5.26751666136470E-01, -1.15415030887322E-01)
-
-PATH NUMBER =       650
-
-ARCLEN =  1.43377340104841E+00
-NFE =  285
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93353503061917E-01
-
-X( 1) = (  9.06653671709079E-01,  2.23086149084885E-02)
-X( 2) = (  2.50164248389225E-01, -3.68937461645441E-01)
-X( 3) = (  3.95724099537670E-01, -4.03245444346800E-01)
-X( 4) = ( -3.91194247249508E-01,  1.40755173684621E-01)
-
-X( 5) = ( -5.19299764717566E-01, -3.61916590833139E-02)
-
-PATH NUMBER =       651
-
-ARCLEN =  2.44711453889002E+00
-NFE =  527
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999989759499E-01
-
-X( 1) = (  4.42204494364635E-01,  3.15742699990614E-01)
-X( 2) = (  4.64655290023166E-01, -4.29306473032818E-01)
-X( 3) = (  2.84533182164735E+00,  3.35952296674027E+00)
-X( 4) = (  1.43496455773983E+00,  2.28272463143053E+00)
-
-X( 5) = ( -1.14702835541758E-01,  7.74005465844517E-02)
-
-PATH NUMBER =       652
-
-ARCLEN =  1.53881944218873E+00
-NFE =  357
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99703483149872E-01
-
-X( 1) = (  8.09046725733914E-01,  3.57627454714316E-01)
-X( 2) = (  1.57920740111883E-01, -2.92858729072533E-01)
-X( 3) = (  8.80448423397852E-01, -8.81079209773738E-02)
-X( 4) = ( -4.66704100248120E-01,  1.83906099647160E-01)
-
-X( 5) = ( -3.57292920581284E-01,  1.07274561435831E-01)
-
-PATH NUMBER =       653
-
-ARCLEN =  3.50914658918946E+00
-NFE =  263
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999997880923E-01
-
-X( 1) = (  1.77788933305482E+01,  7.37423392606897E-01)
-X( 2) = (  8.63845526086151E+00, -4.55996294201696E-01)
-X( 3) = (  1.01097256188489E+00,  1.19360300656184E-03)
-X( 4) = ( -8.61685568306165E-03, -9.23916085190201E-04)
-
-X( 5) = ( -3.12374524038339E-02, -2.00241818007829E-03)
-
-PATH NUMBER =       654
-
-ARCLEN =  3.39379721953179E+01
-NFE =  502
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99355522217249E-01
-
-X( 1) = (  5.67891507124994E-01,  1.63512822921647E-01)
-X( 2) = (  7.38102122611197E-02,  2.31305320906197E+00)
-X( 3) = (  4.98514507096147E-01, -7.54769285268441E-01)
-X( 4) = (  4.10644295124337E-01,  7.35402796949924E-01)
-
-X( 5) = (  1.69725979018007E-01,  6.45198351129398E-01)
-
-PATH NUMBER =       655
-
-ARCLEN =  4.16900823040988E+00
-NFE =  455
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99537553281532E-01
-
-X( 1) = (  8.32821671661434E-01,  4.00488711039304E-03)
-X( 2) = ( -2.08363264621899E-01, -1.52791801307962E+00)
-X( 3) = (  5.38924015225771E-01, -1.03976447016645E-01)
-X( 4) = ( -3.46491249851234E-01, -1.40388878624859E-01)
-
-X( 5) = ( -3.57047237834513E-01, -1.62379887267140E-01)
-
-PATH NUMBER =       656
-
-ARCLEN =  3.42951053395869E+00
-NFE =  114
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.59916677527082E-15
-
-X( 1) = (  2.88212050470095E-01,  1.11126781190256E-02)
-X( 2) = ( -5.04565312019078E+14, -3.56757009300394E+14)
-X( 3) = (  3.67775364350111E+14,  1.04532506445229E+14)
-X( 4) = ( -2.91165091604064E+14,  3.08122061908775E+12)
-
-X( 5) = ( -1.16849889139625E-15, -1.24260410988564E-15)
-
-PATH NUMBER =       657
-
-ARCLEN =  1.55073875159786E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96588176406256E-01
-
-X( 1) = (  7.45052656933705E-01, -2.69780438308046E-01)
-X( 2) = ( -6.22786169830812E-01, -1.27706171303783E+00)
-X( 3) = (  6.46751182203018E-01,  8.82346406678984E-02)
-X( 4) = ( -8.07397194846982E-01, -2.88362981688424E-01)
-
-X( 5) = ( -4.61049582137032E-01, -2.41936457381911E-01)
-
-PATH NUMBER =       658
-
-ARCLEN =  3.40726313175071E+00
-NFE =  228
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.89259778801383E-11
-
-X( 1) = (  1.65690627520121E+10, -1.48421400775406E+11)
-X( 2) = ( -2.04804212410597E+10,  1.12419511006995E+11)
-X( 3) = (  5.08017704020199E-01, -3.51110282038630E-04)
-X( 4) = ( -6.93575717803085E+10,  1.50010747466684E+11)
-
-X( 5) = (  3.84884376973538E-12, -6.62763545216868E-12)
-
-PATH NUMBER =       659
-
-ARCLEN =  1.34467717982994E+00
-NFE =  335
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99483807795810E-01
-
-X( 1) = (  1.05617237404197E+00,  2.06616220530553E-01)
-X( 2) = ( -2.14728584124928E-01, -3.03742155915725E-01)
-X( 3) = (  1.09323183646160E+00, -7.29158562355493E-02)
-X( 4) = ( -2.40192370291274E-01, -2.68378228583488E-01)
-
-X( 5) = ( -4.05505600922776E-01,  2.67621378533125E-02)
-
-PATH NUMBER =       660
-
-ARCLEN =  1.39475158117851E+00
-NFE =  352
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99670665420061E-01
-
-X( 1) = (  8.62720838391634E-01,  5.12177325569318E-01)
-X( 2) = (  4.13408354808261E-01, -5.70138530954398E-01)
-X( 3) = (  7.00506424202781E-01, -1.26252870580814E-01)
-X( 4) = ( -3.91175060657513E-01,  1.64953074560945E-01)
-
-X( 5) = ( -3.22311270700355E-01,  8.95658414617075E-02)
-
-PATH NUMBER =       661
-
-ARCLEN =  1.37927703273098E+00
-NFE =  224
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95191411612398E-01
-
-X( 1) = (  7.88790358026424E-01,  5.16534420581211E-01)
-X( 2) = (  2.21098585493359E-02, -4.28825928538912E-01)
-X( 3) = (  8.93728075045420E-01, -1.13846693403234E-01)
-X( 4) = ( -4.40081338708418E-01, -4.05958142704194E-01)
-
-X( 5) = ( -3.80441413323246E-01,  1.42951819221117E-01)
-
-PATH NUMBER =       662
-
-ARCLEN =  2.31022335445417E+00
-NFE =  221
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.05234257724336E-06
-
-X( 1) = (  8.59852448542361E+05,  6.56956966193599E+05)
-X( 2) = (  2.10074723725322E+05,  4.05350196351143E+05)
-X( 3) = (  9.74167372538261E-01,  2.18236815621557E-02)
-X( 4) = (  2.64198991634886E-02, -1.86404945972789E-02)
-
-X( 5) = ( -5.24987689387617E-07,  3.44052473291007E-07)
-
-PATH NUMBER =       663
-
-ARCLEN =  3.91535771950768E+00
-NFE =  239
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.94771606376833E-12
-
-X( 1) = ( -4.59797375234422E+10,  4.35228516424955E+10)
-X( 2) = ( -3.35068555450438E+10,  3.38239380697756E+10)
-X( 3) = (  5.00223753864093E-01,  1.06626202493715E-04)
-X( 4) = (  1.31033521693065E+11, -6.60427217608557E+10)
-
-X( 5) = (  5.99149240420802E-12,  1.25568831591330E-12)
-
-PATH NUMBER =       664
-
-ARCLEN =  1.12268795066698E+01
-NFE =  308
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999988E-01
-
-X( 1) = ( -6.63548472477800E-02, -1.64656216883683E-02)
-X( 2) = (  6.70308402063337E+02, -1.03645839236695E+03)
-X( 3) = (  9.32570937275002E-01, -1.00905438339284E-02)
-X( 4) = (  6.36664227967061E+01, -3.21517737472779E+02)
-
-X( 5) = ( -7.59182814423150E-04, -2.42646021303767E-04)
-
-PATH NUMBER =       665
-
-ARCLEN =  2.26685546482522E+00
-NFE =  388
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99837633947429E-01
-
-X( 1) = (  5.19950786365883E-01,  7.33587863919539E-01)
-X( 2) = (  9.32653617423892E-01, -1.61307902917710E+00)
-X( 3) = (  5.92631219648747E-01, -1.12405118580439E-01)
-X( 4) = ( -1.90104217105870E-01, -8.47600897167399E-01)
-
-X( 5) = ( -2.98719145370727E-01,  8.78064639265926E-02)
-
-PATH NUMBER =       666
-
-ARCLEN =  8.34563476379201E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996320532595E-01
-
-X( 1) = (  3.33748473872366E+00,  1.91430656640180E+01)
-X( 2) = ( -1.63682059386864E+01, -2.61106205471642E+01)
-X( 3) = (  6.30459252757235E-01, -1.26973818287682E-02)
-X( 4) = ( -7.42528785547383E+00, -2.65293941840755E+01)
-
-X( 5) = ( -1.21728628134854E-01, -2.67726293287196E-02)
-
-PATH NUMBER =       667
-
-ARCLEN =  1.60654716034331E+00
-NFE =  226
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96269421326551E-01
-
-X( 1) = (  4.66999878313885E-01, -7.41479993493151E-02)
-X( 2) = ( -3.56314782974662E-01, -6.51316039668827E-01)
-X( 3) = (  9.16753465508712E-01, -2.87578676243003E-02)
-X( 4) = ( -1.94619416346381E-01, -4.69784081640331E-01)
-
-X( 5) = ( -7.36853764121686E-01, -1.01097300905910E-01)
-
-PATH NUMBER =       668
-
-ARCLEN =  1.32821679976988E+00
-NFE =  427
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98311181438134E-01
-
-X( 1) = (  6.65280614052023E-01,  4.84740639466448E-01)
-X( 2) = ( -3.80546784558117E-02, -4.76792141275309E-01)
-X( 3) = (  7.52528045474278E-01, -1.38210162333885E-01)
-X( 4) = ( -4.50755993926453E-01, -9.36658788172055E-01)
-
-X( 5) = ( -4.61979130141677E-01,  2.62573518809622E-01)
-
-PATH NUMBER =       669
-
-ARCLEN =  2.21348382166960E+00
-NFE =  197
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.33743133963814E-09
-
-X( 1) = (  5.27599740847596E+07, -1.03452382470369E+08)
-X( 2) = (  4.96741583065376E-01, -2.88191371238076E-01)
-X( 3) = ( -3.71749016224668E+07,  1.22848545711830E+07)
-X( 4) = ( -5.54432068238419E+07,  4.28243526392354E+07)
-
-X( 5) = (  2.27474106906508E-10, -8.18737948130640E-09)
-
-PATH NUMBER =       670
-
-ARCLEN =  1.65976071481966E+00
-NFE =  186
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.25380090968583E-10
-
-X( 1) = ( -7.99288200721171E+09,  2.94724632712526E+08)
-X( 2) = (  4.51152793820530E-01,  2.12386288230934E-01)
-X( 3) = ( -1.35929813182635E+09,  2.42180808957627E+09)
-X( 4) = (  4.59744816981564E+09,  1.06014552897275E+09)
-
-X( 5) = (  6.79958881897019E-11,  3.03433355373396E-11)
-
-PATH NUMBER =       671
-
-ARCLEN =  3.23506307728351E+00
-NFE =  499
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97166820058463E-01
-
-X( 1) = (  8.92515102069049E-01, -1.42567896218955E+00)
-X( 2) = (  9.96906392752874E-01, -1.21593250013041E-02)
-X( 3) = ( -5.93283603113442E-01, -4.28271999709745E-01)
-X( 4) = ( -1.94549329619013E-01,  4.89660570786707E-01)
-
-X( 5) = ( -1.75049609012507E-01, -7.71293399879495E-01)
-
-PATH NUMBER =       672
-
-ARCLEN =  2.85533135879096E+00
-NFE =  296
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999799E-01
-
-X( 1) = (  6.16794134599973E+00,  6.34906094016328E+00)
-X( 2) = (  1.88451746533518E-03,  6.61558126550743E-02)
-X( 3) = (  1.00750899432695E+00, -2.08483822984726E-04)
-X( 4) = ( -5.74501024603996E+00,  4.59424442290989E+01)
-
-X( 5) = ( -2.58678456472971E-02, -2.59269138947632E-03)
-
-PATH NUMBER =       673
-
-ARCLEN =  2.76557625623932E+02
-NFE =  481
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.69873110207745E-01
-
-X( 1) = ( -7.12552689296151E-01,  5.20443196001160E-01)
-X( 2) = ( -1.50833187727785E+00, -1.67394798980132E+00)
-X( 3) = (  8.09091301911082E-01, -7.11571465629019E-03)
-X( 4) = ( -9.03106060649445E-01, -6.63702752906525E-01)
-
-X( 5) = (  4.50312355489656E+00, -2.91404846107782E+00)
-
-PATH NUMBER =       674
-
-ARCLEN =  3.97095221488669E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99712109960371E-01
-
-X( 1) = (  4.78702447651598E-01, -8.88187864763312E-02)
-X( 2) = (  8.48448379844412E-01, -9.68283442713076E-01)
-X( 3) = (  5.30760377270651E-01,  5.93813175634018E-01)
-X( 4) = ( -6.59726998233611E-01, -1.27413688647252E+00)
-
-X( 5) = ( -2.84792768661053E-01,  2.66284266874359E-01)
-
-PATH NUMBER =       675
-
-ARCLEN =  5.38780332261971E+00
-NFE =  580
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99963960737755E-01
-
-X( 1) = (  1.48357901730103E-01,  6.37609988708667E-02)
-X( 2) = ( -8.64884613871989E-01, -1.58481039791089E+00)
-X( 3) = (  8.83503709095298E-01,  2.35081164424404E-02)
-X( 4) = ( -3.70738775066789E-02, -1.69308685052122E+00)
-
-X( 5) = ( -6.31690558028530E-01, -9.17344404761963E-01)
-
-PATH NUMBER =       676
-
-ARCLEN =  1.19237084050723E+00
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97754234870374E-01
-
-X( 1) = ( -1.69000588829519E-02,  5.87938715251558E-01)
-X( 2) = (  6.32006839667707E-01, -6.35202204219980E-01)
-X( 3) = (  7.34676538905549E-01,  3.27952574625546E-01)
-X( 4) = (  2.57560347723369E-01, -9.65635420170470E-01)
-
-X( 5) = ( -2.22243888355043E-01,  3.37621195339915E-01)
-
-PATH NUMBER =       677
-
-ARCLEN =  1.11385529530147E+00
-NFE =  455
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94646982192810E-01
-
-X( 1) = (  4.65864762461631E-01,  3.99784218828617E-01)
-X( 2) = (  2.48941642792250E-01, -2.46277082280120E-01)
-X( 3) = (  9.66526564911148E-01, -5.14319127450308E-02)
-X( 4) = ( -2.38169942734117E-01, -6.06637528640423E-01)
-
-X( 5) = ( -3.69787421806956E-01,  2.52789667923496E-01)
-
-PATH NUMBER =       678
-
-ARCLEN =  2.54939394414189E+00
-NFE =  233
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.72202707616387E-08
-
-X( 1) = ( -1.37735467455934E+08, -3.80657079284766E+07)
-X( 2) = (  4.85221567684003E-01, -2.64402488876551E-01)
-X( 3) = ( -7.75939190227113E+06,  4.68366096249417E+07)
-X( 4) = (  1.08702230704029E+08,  6.86423961123883E+07)
-
-X( 5) = (  5.10347179663931E-09,  4.38311952705162E-10)
-
-PATH NUMBER =       679
-
-ARCLEN =  2.08763790507431E+00
-NFE =  406
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999983481289E-01
-
-X( 1) = (  6.51880672306850E+00,  2.66090932197067E+00)
-X( 2) = (  4.83451709472057E-01,  4.54503344341471E-01)
-X( 3) = (  5.46140344084734E-01, -2.30264738098880E-01)
-X( 4) = ( -1.19230066258233E+00, -1.91672666129610E+00)
-
-X( 5) = ( -1.01173762094187E-01,  2.37463250116579E-02)
-
-PATH NUMBER =       680
-
-ARCLEN =  1.61757756389679E+00
-NFE =  405
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99763786573427E-01
-
-X( 1) = ( -2.40395228955965E-01,  6.06801539376397E-01)
-X( 2) = (  6.85568713848353E-01,  2.37740701253191E-02)
-X( 3) = (  1.11700167661330E+00,  1.42394056060144E-01)
-X( 4) = ( -2.25094910109967E-01, -1.68808651107906E-01)
-
-X( 5) = ( -1.75235914091451E-01,  2.67739920561994E-01)
-
-PATH NUMBER =       681
-
-ARCLEN =  2.68997328687457E+00
-NFE =  272
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999972E-01
-
-X( 1) = ( -3.08615770952870E+01,  5.39867226145129E+01)
-X( 2) = (  5.33539073172303E-02,  4.66141882428899E-03)
-X( 3) = (  9.94904928333519E-01, -6.29290601609528E-04)
-X( 4) = ( -1.85285535670253E+01,  3.75101729323713E+01)
-
-X( 5) = ( -2.24354516577054E-03,  1.12166242887532E-02)
-
-PATH NUMBER =       682
-
-ARCLEN =  7.22614047925057E+00
-NFE =  314
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.68032763618537E-01
-
-X( 1) = ( -6.64229235576895E-01,  4.00670241022826E-01)
-X( 2) = ( -6.63368648397691E-01, -1.28569397723070E+00)
-X( 3) = (  8.51651800238532E-01,  3.54145441238714E-02)
-X( 4) = ( -2.43543375314187E-01, -1.04287065103827E+00)
-
-X( 5) = (  2.95020228200791E-02,  1.95702166710911E+00)
-
-PATH NUMBER =       683
-
-ARCLEN =  7.68758342160679E+00
-NFE =  397
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99767592021340E-01
-
-X( 1) = ( -4.80698686396022E-01, -1.71185766202586E-01)
-X( 2) = (  8.04042364128786E-01, -8.33165612983104E-01)
-X( 3) = (  8.36006680880412E-01,  8.62998638394743E-02)
-X( 4) = ( -2.34363177421201E-01, -4.81739294754162E-01)
-
-X( 5) = ( -4.48295334258053E-01,  4.25538004345597E-01)
-
-PATH NUMBER =       684
-
-ARCLEN =  3.25539340434019E+01
-NFE =  457
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.54154344508230E-11
-
-X( 1) = ( -5.52552525358437E+11, -1.05169304552038E+11)
-X( 2) = (  7.21998791282075E+11, -5.80880721143548E+11)
-X( 3) = (  5.00466687761395E-01, -2.64055276678428E-03)
-X( 4) = (  9.09970612562297E+11, -3.10045576230326E+11)
-
-X( 5) = (  1.47806029568431E-12, -4.17701019172351E-12)
-
-PATH NUMBER =       685
-
-ARCLEN =  1.56094374336480E+00
-NFE =  326
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98804928527631E-01
-
-X( 1) = ( -1.53400389747978E-02,  2.81467773216316E-01)
-X( 2) = (  5.99807666996089E-01, -5.53948668979082E-01)
-X( 3) = (  8.86499851696380E-01,  2.08199371762663E-01)
-X( 4) = (  1.31813671601112E-01, -8.96498831826560E-01)
-
-X( 5) = ( -3.07980674236457E-01,  3.59800434975081E-01)
-
-PATH NUMBER =       686
-
-ARCLEN =  1.36084388902912E+00
-NFE =  295
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95695607084835E-01
-
-X( 1) = (  4.65598650100744E-01,  4.75094345374711E-01)
-X( 2) = (  2.53319623595341E-02, -5.24174038315054E-01)
-X( 3) = (  8.60360846796280E-01, -2.47289740093592E-02)
-X( 4) = ( -1.26618644321707E-01, -5.67367749933251E-01)
-
-X( 5) = ( -4.51805660970752E-01,  2.36370817647962E-01)
-
-PATH NUMBER =       687
-
-ARCLEN =  1.45452818441596E+00
-NFE =  479
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94788699824448E-01
-
-X( 1) = ( -1.56914166764275E-02,  2.99988012048523E-01)
-X( 2) = (  8.31543438930092E-01,  4.85684921015768E-02)
-X( 3) = (  7.10937311883123E-01,  1.53853576014032E-01)
-X( 4) = (  2.46399731050695E-01, -3.86850169224128E-01)
-
-X( 5) = ( -2.01712256632369E-01,  3.69480406317914E-01)
-
-PATH NUMBER =       688
-
-ARCLEN =  1.57467138827212E+00
-NFE =  437
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99415212897411E-01
-
-X( 1) = ( -4.56950250852708E-02,  2.54315098985866E-01)
-X( 2) = (  7.30192177575277E-01,  2.91724765453780E-01)
-X( 3) = (  8.35878086966228E-01,  1.40222226108062E-02)
-X( 4) = ( -2.66193212423116E-02, -2.98447110620483E-01)
-
-X( 5) = ( -1.92544376889380E-01,  3.74909653178717E-01)
-
-PATH NUMBER =       689
-
-ARCLEN =  2.08885106512503E+00
-NFE =  244
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.88444161152805E-08
-
-X( 1) = (  2.95157884132457E+06, -2.33219898799339E+06)
-X( 2) = (  4.81321991934234E-01,  1.06737967176636E-01)
-X( 3) = ( -5.55840834560433E+06, -8.27933564667827E+05)
-X( 4) = (  6.47807791889937E-01, -9.53967678595981E-01)
-
-X( 5) = (  9.35841517866489E-08, -9.51943889800425E-08)
-
-PATH NUMBER =       690
-
-ARCLEN =  4.94156189752456E+00
-NFE =  353
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999997921E-01
-
-X( 1) = ( -1.82294638829872E+01, -5.29226495823565E+01)
-X( 2) = (  4.91623796715274E-01,  1.04152079152081E-01)
-X( 3) = (  5.83297298076347E-01, -1.04880525425315E+00)
-X( 4) = ( -1.61781792360298E+01,  7.90437523322686E+01)
-
-X( 5) = (  1.05121665028351E-03, -1.43766121262272E-02)
-
-PATH NUMBER =       691
-
-ARCLEN =  4.14934060731228E+00
-NFE =  316
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999991376838E-01
-
-X( 1) = (  5.03129825233548E-01, -8.51476400705164E+00)
-X( 2) = (  2.29060236911546E+00, -3.74374080409823E+00)
-X( 3) = (  4.73374948500540E-01,  1.84858197496100E-01)
-X( 4) = (  4.78466974240795E-01, -3.24616208017424E-01)
-
-X( 5) = ( -5.14186220646999E-03, -8.50793455315379E-02)
-
-PATH NUMBER =       692
-
-ARCLEN =  2.66676553692027E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99186658281755E-01
-
-X( 1) = ( -5.64781607046629E-03,  2.00816071221163E-02)
-X( 2) = (  1.06887755390539E+00, -9.17708149030425E-02)
-X( 3) = (  3.05395596881240E-01,  1.01524555583110E+00)
-X( 4) = (  9.46924108839551E-01, -9.65503920997530E-01)
-
-X( 5) = ( -4.10952334315616E-02,  3.56741398234226E-01)
-
-PATH NUMBER =       693
-
-ARCLEN =  3.22930289426843E+00
-NFE =  400
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98897077297434E-01
-
-X( 1) = ( -1.10488419580439E-01, -5.99890762774269E-02)
-X( 2) = (  1.24661869909731E+00,  3.74904475859444E-01)
-X( 3) = ( -1.60961703984389E-01,  4.13841313470581E-01)
-X( 4) = (  7.77622962651157E-01, -4.90020825947301E-02)
-
-X( 5) = (  3.47254048348916E-02,  4.26382040958621E-01)
-
-PATH NUMBER =       694
-
-ARCLEN =  2.52565177368360E+00
-NFE =  353
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84839836437452E-01
-
-X( 1) = (  3.38316339526818E-01, -3.02640893154631E-01)
-X( 2) = (  6.03206585301813E-01,  6.64577107562095E-02)
-X( 3) = (  3.54373590620882E-01, -1.21746428864231E-01)
-X( 4) = ( -6.32854466844166E-02, -4.12155766461578E-01)
-
-X( 5) = ( -6.03994656599468E-01,  8.09282843772829E-01)
-
-PATH NUMBER =       695
-
-ARCLEN =  1.25565327199916E+00
-NFE =  368
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99444800293697E-01
-
-X( 1) = (  1.43968325196640E-01,  2.67537978864075E-01)
-X( 2) = (  4.05654833014975E-01, -3.24877953876041E-02)
-X( 3) = (  1.12723786171217E+00,  5.34248938897404E-02)
-X( 4) = ( -1.66103255651549E-01, -8.55707232020135E-01)
-
-X( 5) = ( -2.80640789685522E-01,  3.44620552075356E-01)
-
-PATH NUMBER =       696
-
-ARCLEN =  1.25276094349627E+00
-NFE =  249
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98475389745868E-01
-
-X( 1) = (  5.19987540019232E-02,  3.12712020712830E-01)
-X( 2) = (  2.95956518907627E-01,  2.99624197650499E-01)
-X( 3) = (  1.08322984577527E+00,  8.13149633807962E-02)
-X( 4) = (  3.30303835576163E-01, -4.38100212206258E-01)
-
-X( 5) = ( -2.51125500195575E-01,  4.29884224543205E-01)
-
-PATH NUMBER =       697
-
-ARCLEN =  1.54682949579606E+00
-NFE =  313
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98745486605755E-01
-
-X( 1) = ( -2.23593460008817E-01,  2.36041764352422E-01)
-X( 2) = (  5.41211417555713E-01,  3.22821949161220E-01)
-X( 3) = (  8.64219478195302E-01,  2.15619811016152E-01)
-X( 4) = (  4.70374332194700E-01, -1.82288195722143E-01)
-
-X( 5) = ( -1.38032280202642E-01,  4.44879664740033E-01)
-
-PATH NUMBER =       698
-
-ARCLEN =  2.20483655448375E+00
-NFE =  310
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99648332128342E-01
-
-X( 1) = ( -5.07912984577283E-01,  2.47451618533526E-01)
-X( 2) = (  5.44291219526388E-01,  8.49996727559423E-01)
-X( 3) = (  8.46065453549238E-01,  1.72716858291058E-01)
-X( 4) = (  4.33985820303216E-01,  1.35115951366564E-01)
-
-X( 5) = ( -6.65067152655569E-03,  3.87736825526179E-01)
-
-PATH NUMBER =       699
-
-ARCLEN =  4.12580485501918E+00
-NFE =  280
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.74389361385255E-01
-
-X( 1) = (  5.16464776209662E-02, -6.89865223142609E-01)
-X( 2) = (  1.12497629167683E+00, -2.82279818242963E-01)
-X( 3) = ( -8.58456608325696E-01, -4.39391823655658E-01)
-X( 4) = (  4.63995886865723E-01,  1.48138824175388E-01)
-
-X( 5) = (  1.17167702032844E+00, -3.73422912296435E-01)
-
-PATH NUMBER =       700
-
-ARCLEN =  2.34216875255181E+00
-NFE =  302
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96523864403545E-01
-
-X( 1) = (  3.63197119469352E-02,  1.81073431666825E-01)
-X( 2) = (  1.05300961551545E-01, -4.05899594283618E-01)
-X( 3) = (  1.00079317971953E+00,  2.03927240162872E-02)
-X( 4) = (  1.66050834971949E-01, -9.86220425563684E-01)
-
-X( 5) = ( -5.23890208142043E-01,  5.48249402286867E-01)
-
-PATH NUMBER =       701
-
-ARCLEN =  1.04114319905864E+01
-NFE =  274
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.32767041862114E-12
-
-X( 1) = (  4.89038682793825E-01, -9.47690190046068E-03)
-X( 2) = (  5.15340261937435E+12, -5.41811880274595E+12)
-X( 3) = ( -2.07877046762664E+12,  4.44080627603288E+12)
-X( 4) = (  1.97704213228082E+12, -8.89304020322196E+11)
-
-X( 5) = ( -1.12981997889283E-13,  9.55685183767763E-14)
-
-PATH NUMBER =       702
-
-ARCLEN =  4.58511197655835E+00
-NFE =  508
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988020695009E-01
-
-X( 1) = (  3.54646337971188E-01, -2.10900538440002E-01)
-X( 2) = (  3.20391445999180E-01, -3.82384079407689E-02)
-X( 3) = (  9.50744727818270E-01,  2.25393535797818E-01)
-X( 4) = ( -4.43536862788730E-01, -1.91647927642392E+00)
-
-X( 5) = ( -2.03351949546310E-01,  5.33073924819519E-01)
-
-PATH NUMBER =       703
-
-ARCLEN =  3.10947905513207E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99401195911282E-01
-
-X( 1) = (  5.77244593997436E-01, -3.15216716386065E-01)
-X( 2) = ( -1.35721745332468E-01,  6.13118304025114E-02)
-X( 3) = (  7.43965323254834E-01,  9.26956639370419E-02)
-X( 4) = ( -1.56917105247620E-01, -5.95017055249619E-01)
-
-X( 5) = ( -1.00742517494507E+00,  6.56867665362773E-01)
-
-PATH NUMBER =       704
-
-ARCLEN =  1.47101171307108E+00
-NFE =  264
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99057304439562E-01
-
-X( 1) = (  2.86264927444802E-01,  1.44880688030658E-01)
-X( 2) = (  2.05315740771428E-01,  8.18836827260553E-02)
-X( 3) = (  1.05921432836222E+00,  4.04265515615238E-02)
-X( 4) = (  1.88087850263800E-01, -7.06755187694762E-01)
-
-X( 5) = ( -4.08487452205854E-01,  4.32212655097264E-01)
-
-PATH NUMBER =       705
-
-ARCLEN =  1.32144276040968E+00
-NFE =  265
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98963093300411E-01
-
-X( 1) = (  2.51114572041800E-01,  1.17563770194441E-01)
-X( 2) = ( -6.88133340708738E-02,  2.59289726604732E-01)
-X( 3) = (  1.02899294727170E+00,  5.92886462504723E-02)
-X( 4) = (  3.40493190203755E-01, -1.59075873499023E-01)
-
-X( 5) = ( -5.19751994870943E-01,  5.39516143013558E-01)
-
-PATH NUMBER =       706
-
-ARCLEN =  1.52014493231079E+00
-NFE =  268
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98006942006324E-01
-
-X( 1) = (  8.70837482398270E-03,  1.51463882602005E-01)
-X( 2) = ( -9.94834354527586E-03,  5.26360883329203E-01)
-X( 3) = (  9.88404109532375E-01,  6.27982829813817E-02)
-X( 4) = (  4.06838856433962E-01,  1.01187953626687E-01)
-
-X( 5) = ( -2.69827570510879E-01,  6.40276562768580E-01)
-
-PATH NUMBER =       707
-
-ARCLEN =  2.43125767331361E+00
-NFE =  400
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98949890167534E-01
-
-X( 1) = ( -1.77584210826047E-01,  7.39066756977936E-02)
-X( 2) = (  1.59935961889507E-01,  8.41389309665590E-01)
-X( 3) = (  9.28380520278531E-01, -1.76962501787192E-02)
-X( 4) = (  2.88261846803456E-01,  3.99179632580173E-01)
-
-X( 5) = ( -1.11280543223625E-01,  5.96002207363892E-01)
-
-PATH NUMBER =       708
-
-ARCLEN =  3.41958744605019E+00
-NFE =  394
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97307985678321E-01
-
-X( 1) = ( -6.11845083929284E-01,  2.78690734258041E-01)
-X( 2) = ( -9.77241919446364E-01,  8.59532703600466E-02)
-X( 3) = (  7.31153926182622E-01,  6.69237056524918E-02)
-X( 4) = (  9.29929169120331E-01, -1.34277941738407E-01)
-
-X( 5) = (  6.59859105262112E-01,  2.57805917380878E-01)
-
-PATH NUMBER =       709
-
-ARCLEN =  3.70244861418359E+00
-NFE =  354
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97853143760904E-01
-
-X( 1) = (  1.54582614658351E-01, -1.61419236464522E-01)
-X( 2) = ( -2.59763754800364E-01, -4.05706516911279E-01)
-X( 3) = (  1.06677428571123E+00,  1.44025888571568E-02)
-X( 4) = (  2.96723274186085E-01, -6.35629521155336E-01)
-
-X( 5) = ( -1.27955645073164E+00,  1.11888496583544E-02)
-
-PATH NUMBER =       710
-
-ARCLEN =  1.53194600050591E+01
-NFE =  239
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.91148114393179E-09
-
-X( 1) = (  9.11259265964350E-02,  4.11168464191007E-02)
-X( 2) = (  6.20388309601608E+07,  2.57972373646655E+06)
-X( 3) = ( -9.22590827949184E+07, -5.83926489547600E+07)
-X( 4) = (  9.09015211725666E-01, -1.25549701040009E-02)
-
-X( 5) = (  1.18571388565112E-08, -3.91737593448752E-09)
-
-PATH NUMBER =       711
-
-ARCLEN =  4.56309058641746E+01
-NFE =  494
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999984225E-01
-
-X( 1) = (  1.76035124142825E+01, -5.31795003103494E+00)
-X( 2) = (  5.06810003788130E-01, -5.14508246951307E-01)
-X( 3) = (  5.05027927252829E-01,  1.69458455828804E-01)
-X( 4) = ( -2.34300860474781E+00, -4.64949972013915E+00)
-
-X( 5) = ( -3.63126920664452E-02, -2.54886786184642E-02)
-
-PATH NUMBER =       712
-
-ARCLEN =  2.64678552991296E+00
-NFE =  286
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99254098743878E-01
-
-X( 1) = (  7.35499367459845E-01, -1.71217474785935E-01)
-X( 2) = ( -3.35981311078529E-01, -9.22200912683040E-01)
-X( 3) = (  7.55730516051436E-01,  5.52510532163824E-01)
-X( 4) = ( -7.27394739527263E-02, -5.88226347369536E-01)
-
-X( 5) = ( -6.39408292950372E-01,  3.68974472325381E-02)
-
-PATH NUMBER =       713
-
-ARCLEN =  3.88529522515469E+00
-NFE =  346
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99723621771125E-01
-
-X( 1) = (  6.45156715181693E-01, -1.23598763961380E-01)
-X( 2) = ( -3.59166475300398E-01, -5.86139074184751E-01)
-X( 3) = (  9.46615024485358E-01,  2.03564545938731E-02)
-X( 4) = (  1.37406534085905E-01, -8.26053115291180E-03)
-
-X( 5) = ( -5.42950474899271E-01, -1.69239801284661E-01)
-
-PATH NUMBER =       714
-
-ARCLEN =  1.31722616560485E+00
-NFE =  238
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99015535307524E-01
-
-X( 1) = (  5.09272058509648E-01,  1.15644461522561E-01)
-X( 2) = ( -3.86439666471340E-01, -8.15507558295152E-02)
-X( 3) = (  1.02810946063523E+00,  4.38108167767479E-02)
-X( 4) = (  1.69029349439400E-01,  5.59878176635375E-02)
-
-X( 5) = ( -6.97164692248344E-01,  1.42701943434136E-01)
-
-PATH NUMBER =       715
-
-ARCLEN =  4.81902599034128E+00
-NFE =  348
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.23826868502315E-09
-
-X( 1) = ( -5.52901394125625E-01,  2.14248165201447E-01)
-X( 2) = ( -6.25758185294791E+09,  5.65991343342194E+09)
-X( 3) = (  2.73503594128906E+09, -6.20186272369554E+09)
-X( 4) = (  6.03077886575620E-01,  1.57551010715308E-02)
-
-X( 5) = (  5.90884417404295E-11, -7.42424826585993E-11)
-
-PATH NUMBER =       716
-
-ARCLEN =  2.59249030445614E+00
-NFE =  394
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90650333598814E-01
-
-X( 1) = ( -1.99488314889321E-03,  2.57980042797058E-03)
-X( 2) = ( -5.84403284556150E-01,  6.07067286263038E-01)
-X( 3) = (  9.81520395285963E-01,  3.91358021810089E-02)
-X( 4) = (  9.58347781629973E-02,  7.36554368300542E-01)
-
-X( 5) = ( -4.53213237894631E-01,  1.15415174808458E+00)
-
-PATH NUMBER =       717
-
-ARCLEN =  4.09586037761056E+01
-NFE =  215
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.95384213817067E-14
-
-X( 1) = (  1.77033819375547E+12, -5.59629214356882E+11)
-X( 2) = (  6.13605254566050E+12,  9.39297163678329E+11)
-X( 3) = ( -2.19290324526523E+12, -7.22963521045208E+11)
-X( 4) = (  5.10809919790077E-01, -3.62463679856619E-03)
-
-X( 5) = ( -1.66615988584154E-13,  1.30875291073224E-13)
-
-PATH NUMBER =       718
-
-ARCLEN =  8.73824586783847E+00
-NFE =  396
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99952103050136E-01
-
-X( 1) = (  8.57640355008347E-01, -3.86244129815814E-01)
-X( 2) = ( -2.44029371708575E-01, -6.76455907293451E-01)
-X( 3) = (  9.48430784266987E-01,  2.68825333833472E-02)
-X( 4) = (  6.75460198458933E-02, -2.85785374143013E-04)
-
-X( 5) = ( -4.12475667407222E-01, -1.90544946503675E-01)
-
-PATH NUMBER =       719
-
-ARCLEN =  7.75811131957937E+01
-NFE =  475
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99924438648221E-01
-
-X( 1) = (  4.40992128496474E-01, -2.63194542346931E-01)
-X( 2) = (  2.48845324146468E+00, -1.73288499192171E+00)
-X( 3) = ( -1.77182688980361E+00,  2.02400134398536E+00)
-X( 4) = (  5.01509248671130E-01,  2.11233787915339E-01)
-
-X( 5) = ( -1.04219367657184E-01,  2.74827693618362E-01)
-
-PATH NUMBER =       720
-
-ARCLEN =  1.30544690089144E+01
-NFE =  477
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99892463030098E-01
-
-X( 1) = (  8.49903326910336E-01, -9.24059529694550E-02)
-X( 2) = (  1.23169331527217E-01, -8.93932945522335E-01)
-X( 3) = (  6.28897624862182E-01,  5.77613710209393E-01)
-X( 4) = ( -2.06708110532048E-01, -2.62967422214136E-01)
-
-X( 5) = ( -4.34128828525428E-01,  1.04051135237093E-01)
-
-PATH NUMBER =       721
-
-ARCLEN =  1.38570285368465E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95175161867485E-01
-
-X( 1) = (  6.82399183416382E-01, -1.28108113606943E-01)
-X( 2) = ( -6.38352618355094E-01, -6.44394656915248E-01)
-X( 3) = (  7.84366662167941E-01,  1.29944649674225E-01)
-X( 4) = ( -4.27569944155378E-01, -1.98412041877388E-01)
-
-X( 5) = ( -7.06675495851185E-01, -1.55931173942188E-01)
-
-PATH NUMBER =       722
-
-ARCLEN =  2.35919668949758E+00
-NFE =  475
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99894766815019E-01
-
-X( 1) = (  6.64804500663479E-01,  7.97460064678216E-03)
-X( 2) = ( -4.44225694095522E-01, -9.28881925892187E-01)
-X( 3) = (  2.99932399837498E-01, -5.12499886800232E-03)
-X( 4) = (  3.70227949615018E-01,  4.22102553725556E-02)
-
-X( 5) = ( -5.64723989922893E-01, -4.77234969995326E-01)
-
-PATH NUMBER =       723
-
-ARCLEN =  1.46116430161033E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99908280968329E-01
-
-X( 1) = (  9.91639500384277E-01,  2.27761914691375E-01)
-X( 2) = ( -2.16304494398210E-01, -6.11773708304250E-01)
-X( 3) = (  9.49879824073302E-01,  7.64456571879631E-02)
-X( 4) = ( -9.01845799714515E-02,  5.44406808183543E-02)
-
-X( 5) = ( -3.90483235761315E-01, -1.27312772522009E-03)
-
-PATH NUMBER =       724
-
-ARCLEN =  1.39262628585263E+00
-NFE =  287
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95435189356476E-01
-
-X( 1) = (  5.42922980372342E-01,  4.03329535292968E-01)
-X( 2) = ( -5.48898873953260E-01,  5.41408957782479E-02)
-X( 3) = (  1.00917383581836E+00, -1.53386068588641E-02)
-X( 4) = ( -2.47801161732826E-02,  2.46033831008041E-01)
-
-X( 5) = ( -5.88106162429632E-01,  2.42144614461295E-01)
-
-PATH NUMBER =       725
-
-ARCLEN =  1.71916726016244E+00
-NFE =  300
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.77191827209240E-01
-
-X( 1) = (  2.34870978691246E-01,  1.83385812873259E-01)
-X( 2) = ( -7.66468326241843E-01,  1.31660868486774E-01)
-X( 3) = (  1.00307517629710E+00,  2.84712057859324E-02)
-X( 4) = ( -2.93936737596273E-01,  7.19086670537550E-01)
-
-X( 5) = ( -8.10013852319459E-01,  3.82911846355042E-01)
-
-PATH NUMBER =       726
-
-ARCLEN =  2.09961598672096E+01
-NFE =  226
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.50394500357079E-13
-
-X( 1) = ( -3.76902276528327E+11, -1.56386023878448E+11)
-X( 2) = ( -5.69956575624958E+11, -1.19137031076865E+12)
-X( 3) = ( -1.43026338308166E+11,  3.38193484520694E+11)
-X( 4) = (  5.15342102468772E-01, -1.51191890642274E-03)
-
-X( 5) = (  3.06043791654595E-13, -8.73319699976755E-13)
-
-PATH NUMBER =       727
-
-ARCLEN =  9.97662904536949E+00
-NFE =  350
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99857874166333E-01
-
-X( 1) = (  6.87600424140694E-01, -1.69938953048748E-01)
-X( 2) = ( -4.31620852168705E-01, -1.11891746471293E+00)
-X( 3) = (  9.17908398474282E-01,  2.27990436036425E-02)
-X( 4) = ( -1.02000399661231E-01, -1.15522198793125E-02)
-
-X( 5) = ( -3.91330714527800E-01, -1.91035380494097E-01)
-
-PATH NUMBER =       728
-
-ARCLEN =  1.24197399241565E+01
-NFE =  181
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.47285390333199E-13
-
-X( 1) = (  4.88614888918540E+11, -6.16125053050610E+11)
-X( 2) = (  2.81920324040763E+12, -1.63154528889759E+12)
-X( 3) = ( -6.99172492037251E+11,  3.43140831455348E+10)
-X( 4) = (  4.92877707902223E-01, -4.56134483286023E-03)
-
-X( 5) = ( -3.20226104747606E-13, -3.27859484353099E-14)
-
-PATH NUMBER =       729
-
-ARCLEN =  3.21252431229910E+00
-NFE =  456
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99864627602893E-01
-
-X( 1) = (  6.47866703733412E-01, -2.68466675840759E-01)
-X( 2) = ( -2.97381058246492E-01, -1.11360735110412E+00)
-X( 3) = (  8.34858759695467E-01,  1.30328669621426E-01)
-X( 4) = ( -2.19101406229956E-01,  2.79840063407631E-01)
-
-X( 5) = ( -3.99155324479063E-01, -1.60429612239026E-01)
-
-PATH NUMBER =       730
-
-ARCLEN =  1.03563377465174E+01
-NFE =  347
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999996645E-01
-
-X( 1) = (  4.98637641322097E-01,  4.22998978388078E-02)
-X( 2) = ( -3.28856530354667E+01, -3.76264136740774E+01)
-X( 3) = (  4.25524209913034E-01,  6.97731759306674E-01)
-X( 4) = (  6.19952018716048E-01, -7.89449319344686E-01)
-
-X( 5) = (  3.95395244594486E-04, -1.74707828917437E-02)
-
-PATH NUMBER =       731
-
-ARCLEN =  1.50069193219492E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93180071425659E-01
-
-X( 1) = (  8.54151425797228E-01,  4.11479191944128E-02)
-X( 2) = (  4.83102031060486E-01, -4.06304241975149E-01)
-X( 3) = (  4.44546284198743E-02, -4.69711649432668E-02)
-X( 4) = ( -2.36825251547336E-01, -8.75352050513418E-03)
-
-X( 5) = ( -5.86766497415779E-01,  2.04169085492111E-01)
-
-PATH NUMBER =       732
-
-ARCLEN =  3.04356464896268E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999981E-01
-
-X( 1) = (  1.05110777509983E+00, -5.82335727613116E-01)
-X( 2) = ( -1.33553971411047E+02,  4.72214381016537E+00)
-X( 3) = (  9.07783444732403E-01,  2.55640943763826E-01)
-X( 4) = (  5.47870459331850E-02,  5.51048602007907E-02)
-
-X( 5) = (  5.05687009857455E-03, -3.96217764999853E-03)
-
-PATH NUMBER =       733
-
-ARCLEN =  2.21272960096831E+00
-NFE =  403
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99983729921832E-01
-
-X( 1) = (  1.00248540012554E+00,  1.49239474156988E-01)
-X( 2) = ( -2.27485224935842E-01, -4.80406414069437E-02)
-X( 3) = (  1.39793917856502E+00,  1.13722868983622E-01)
-X( 4) = (  2.60780380479258E-01,  3.42336492259815E-01)
-
-X( 5) = ( -3.59497792652956E-01,  1.88195665122967E-02)
-
-PATH NUMBER =       734
-
-ARCLEN =  2.41863397765566E+00
-NFE =  225
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.01152746726706E-08
-
-X( 1) = ( -1.63904870185269E+06, -2.42390154011624E+06)
-X( 2) = ( -1.01366914834424E+00,  8.07195235232056E-02)
-X( 3) = ( -2.97314735066428E+06, -2.74259867913319E+06)
-X( 4) = (  7.54789413069534E-01,  6.62480925438632E-03)
-
-X( 5) = (  8.40014959257193E-08, -6.25240183803376E-08)
-
-PATH NUMBER =       735
-
-ARCLEN =  2.54268223887105E+00
-NFE =  414
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99978733449081E-01
-
-X( 1) = (  5.21385559523586E-01,  3.91828037158262E-01)
-X( 2) = ( -5.41027977311167E-01, -9.80873571115031E-01)
-X( 3) = (  6.67043335221375E-01, -1.92964542412039E-01)
-X( 4) = (  3.87468897420667E-01,  7.06327449984450E-01)
-
-X( 5) = ( -4.36040808195765E-01, -2.11080108632852E-01)
-
-PATH NUMBER =       736
-
-ARCLEN =  5.72226656558285E+00
-NFE =  591
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999925E-01
-
-X( 1) = (  5.26471676284198E-02, -7.33764585394081E-02)
-X( 2) = (  1.14803232523573E+03,  4.13394630059829E+02)
-X( 3) = ( -3.70119314391137E+02,  1.60666121913604E+02)
-X( 4) = (  9.06220294816555E-01, -6.99221335048679E-03)
-
-X( 5) = ( -1.03306353181885E-04,  6.59882067051202E-04)
-
-PATH NUMBER =       737
-
-ARCLEN =  1.31738032198130E+02
-NFE =  415
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.26032541762983E-13
-
-X( 1) = (  5.02617573023907E+12, -1.68234826437795E+12)
-X( 2) = (  1.75591390404074E+13,  2.38638157282629E+12)
-X( 3) = ( -6.29388353571869E+12, -1.95824495301860E+12)
-X( 4) = (  4.97078530132702E-01, -4.89185008720370E-04)
-
-X( 5) = ( -5.91286459898643E-14,  4.48575096338721E-14)
-
-PATH NUMBER =       738
-
-ARCLEN =  2.56951689820985E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87360084229109E-01
-
-X( 1) = (  7.24959650695428E-01, -7.65397264099137E-02)
-X( 2) = ( -2.98870566133931E-01, -2.56488119028824E+00)
-X( 3) = (  8.59755176961890E-01,  1.49465787832323E+00)
-X( 4) = ( -6.23906973212101E-01, -1.18196373297039E+00)
-
-X( 5) = ( -3.35273960826419E-01,  5.72387854272222E-02)
-
-PATH NUMBER =       739
-
-ARCLEN =  5.33257676830735E+00
-NFE =  459
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999718E-01
-
-X( 1) = (  7.84906346585300E-01,  6.36183913756670E-02)
-X( 2) = (  4.49072683770351E+02, -4.25621031926288E+02)
-X( 3) = ( -3.55102839340943E-01, -1.71460016154739E-01)
-X( 4) = (  8.62978270209926E+01,  2.05883276448280E+01)
-
-X( 5) = ( -1.37525464454176E-03, -1.92439844900969E-04)
-
-PATH NUMBER =       740
-
-ARCLEN =  1.30580375245877E+00
-NFE =  320
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97528775323459E-01
-
-X( 1) = (  8.03937749250042E-01,  1.64253710222492E-01)
-X( 2) = (  8.02612501245591E-01, -2.59509039597537E-01)
-X( 3) = (  1.30157445912647E-01,  2.97568607534627E-03)
-X( 4) = ( -2.40142898356709E-01, -2.19516010193773E-01)
-
-X( 5) = ( -3.90440338238500E-01,  2.74651313014341E-01)
-
-PATH NUMBER =       741
-
-ARCLEN =  1.37870061785287E+00
-NFE =  339
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99980213427672E-01
-
-X( 1) = ( -1.01573723519301E-01,  1.10101125952049E+00)
-X( 2) = (  1.07422249199547E+00, -3.15813550533376E-01)
-X( 3) = (  5.01087047255126E-01,  2.31862402543915E-01)
-X( 4) = (  2.09882939755700E-02, -2.64845254037318E-01)
-
-X( 5) = ( -1.33900707779184E-01,  2.36658771021080E-01)
-
-PATH NUMBER =       742
-
-ARCLEN =  1.26755324902681E+00
-NFE =  366
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99519943337005E-01
-
-X( 1) = (  1.10834355623468E+00,  7.55240058841740E-01)
-X( 2) = ( -1.42256360181763E-01,  5.88723557616542E-03)
-X( 3) = (  9.99591435220507E-01, -1.34675629974970E-02)
-X( 4) = ( -3.18061766692055E-01,  5.53350375971714E-02)
-
-X( 5) = ( -3.07118080887391E-01,  1.35042295274891E-01)
-
-PATH NUMBER =       743
-
-ARCLEN =  1.27163287785531E+01
-NFE =  548
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90934108544627E-01
-
-X( 1) = ( -5.37095707113992E-01,  9.12720685235807E-01)
-X( 2) = ( -1.68728515419443E+00, -7.32854482488942E-01)
-X( 3) = (  8.19042734069789E-01, -4.63713017091583E-02)
-X( 4) = ( -2.88958447478287E-01,  6.72675596776742E-01)
-
-X( 5) = (  3.45805172065887E-01,  3.67154124858263E+00)
-
-PATH NUMBER =       744
-
-ARCLEN =  2.32154333197910E+00
-NFE =  370
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999952207671E-01
-
-X( 1) = (  7.95293605249971E-01,  3.68242445009877E+00)
-X( 2) = (  3.73303525198034E-01, -2.98831652331894E-01)
-X( 3) = (  9.82500578883759E-01, -9.99488478537538E-02)
-X( 4) = (  1.16789426703492E-01, -1.11151797830196E-01)
-
-X( 5) = ( -1.02385253672901E-01,  1.12624875247062E-01)
-
-PATH NUMBER =       745
-
-ARCLEN =  7.99979632947367E+01
-NFE =  387
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.15292261692033E-13
-
-X( 1) = ( -1.15799408080603E+13,  1.29587482105810E+13)
-X( 2) = ( -2.85868144594858E+13, -1.09981962092764E+13)
-X( 3) = (  6.73342145814971E+12,  9.04510083075595E+12)
-X( 4) = (  5.72360874787995E-01,  1.35524457764397E-02)
-
-X( 5) = (  6.29207244032953E-14,  1.36961839439231E-14)
-
-PATH NUMBER =       746
-
-ARCLEN =  9.23601866332923E+00
-NFE =  388
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999884E-01
-
-X( 1) = (  1.36598736132037E+01, -3.00563943931768E+01)
-X( 2) = (  2.52852107299278E+02,  7.87242317349770E+01)
-X( 3) = (  4.98188826858908E-01, -2.40299742780995E-01)
-X( 4) = (  4.99418326268716E-01,  2.29232359587595E-01)
-
-X( 5) = ( -2.25713547767368E-03,  2.85410691378032E-03)
-
-PATH NUMBER =       747
-
-ARCLEN =  2.59052482217870E+00
-NFE =  195
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.57171160728613E-13
-
-X( 1) = (  5.53786274736572E-01,  5.20240472910248E-02)
-X( 2) = (  4.80549020861108E+12,  4.06504611614454E+13)
-X( 3) = ( -4.67239173877372E+12, -3.21016048588950E+13)
-X( 4) = ( -6.11661098839053E+11,  1.69160157246520E+13)
-
-X( 5) = (  3.61682255325957E-14, -1.06987986178697E-14)
-
-PATH NUMBER =       748
-
-ARCLEN =  2.95170083190806E+00
-NFE =  265
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.69046063831721E-13
-
-X( 1) = (  5.30324267553061E-01, -1.95490223018634E-03)
-X( 2) = (  2.53108657717992E+13,  2.35346181203626E+12)
-X( 3) = ( -2.02646897183166E+13,  1.16195086791421E+12)
-X( 4) = (  8.92003449178951E+12,  4.94409183237366E+12)
-
-X( 5) = (  1.74759024525878E-14,  4.96359680787761E-14)
-
-PATH NUMBER =       749
-
-ARCLEN =  1.14072523078399E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99013919335015E-01
-
-X( 1) = (  4.46760747152076E-01,  4.74821274634680E-01)
-X( 2) = (  6.30304222598657E-01, -5.94299532290947E-01)
-X( 3) = (  5.65856646131624E-01,  6.60705412434708E-01)
-X( 4) = (  9.64166325057630E-02, -9.65155902368286E-01)
-
-X( 5) = ( -2.12495807326139E-01,  2.84836786725377E-01)
-
-PATH NUMBER =       750
-
-ARCLEN =  1.22400227100543E+00
-NFE =  325
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99801590542117E-01
-
-X( 1) = (  1.74179596225581E-01,  1.14711494989597E+00)
-X( 2) = (  7.30254735146605E-01, -6.04237537999968E-01)
-X( 3) = (  5.20842397150159E-01,  2.82489750500764E-01)
-X( 4) = (  1.37383754077256E-01, -7.64596338282601E-01)
-
-X( 5) = ( -1.69311161716826E-01,  2.53645029833704E-01)
-
-PATH NUMBER =       751
-
-ARCLEN =  1.28317771680454E+00
-NFE =  375
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99869650548386E-01
-
-X( 1) = (  1.06738586917626E+00,  6.34428187836948E-01)
-X( 2) = (  1.69701316930520E-01, -2.49412793919639E-02)
-X( 3) = (  9.50460992857447E-01, -6.68307017834081E-03)
-X( 4) = ( -3.95339481027327E-01,  9.13886186482661E-02)
-
-X( 5) = ( -2.86351154605331E-01,  1.30915219406095E-01)
-
-PATH NUMBER =       752
-
-ARCLEN =  3.19362380937180E+00
-NFE =  471
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999979E-01
-
-X( 1) = (  8.77490426001899E+01, -5.37304756379590E+01)
-X( 2) = (  9.58437017191843E-01, -5.80375120002693E-02)
-X( 3) = (  4.54396646735583E+01, -3.11573951180189E+01)
-X( 4) = ( -2.01897357158398E-02,  1.82070929425282E-03)
-
-X( 5) = ( -3.09235115238296E-03, -3.51145593937440E-03)
-
-PATH NUMBER =       753
-
-ARCLEN =  2.09378242452026E+00
-NFE =  291
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999995240605E-01
-
-X( 1) = ( -4.11954926447077E+00,  5.66353133223389E+00)
-X( 2) = (  3.05932439739934E-02,  5.07329663586058E-02)
-X( 3) = (  8.30370548699049E-01,  1.69852825826238E-02)
-X( 4) = (  1.71381835007452E+00, -1.62791999795809E-02)
-
-X( 5) = (  1.96714168114762E-02,  1.02233100608048E-01)
-
-PATH NUMBER =       754
-
-ARCLEN =  3.58184917487613E+00
-NFE =  283
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.56270500288697E-09
-
-X( 1) = (  2.74463982347691E-01, -8.32518378915507E-02)
-X( 2) = ( -1.16345528637217E+09,  4.67802849438348E+08)
-X( 3) = (  3.82547723442137E+08, -5.78045097945654E+08)
-X( 4) = (  6.26302163969411E+00, -9.35723027058315E-01)
-
-X( 5) = (  3.75309496940821E-10, -5.18097099618843E-10)
-
-PATH NUMBER =       755
-
-ARCLEN =  3.08832326784019E+00
-NFE =  383
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998883936E-01
-
-X( 1) = (  8.95943113730025E-01,  3.14473961027252E-02)
-X( 2) = (  5.76181133380732E-01, -3.30495611074786E-01)
-X( 3) = ( -1.01313756962378E-01,  1.41259230106130E-02)
-X( 4) = ( -5.23230555156841E+00, -2.67961131930455E+00)
-
-X( 5) = ( -7.05613437907553E-02,  2.20566647152489E-01)
-
-PATH NUMBER =       756
-
-ARCLEN =  6.31554535690746E+00
-NFE =  250
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.86225854865360E-11
-
-X( 1) = ( -4.28541434470901E+09, -9.51439121153786E+09)
-X( 2) = (  7.23264390854032E+10, -9.93504483288004E+09)
-X( 3) = (  4.95242982028808E-01, -4.39835750034795E-04)
-X( 4) = (  2.12149619770111E+10, -3.83331013986447E+09)
-
-X( 5) = ( -1.50976446242849E-11,  7.02241493037367E-12)
-
-PATH NUMBER =       757
-
-ARCLEN =  1.44096176778727E+00
-NFE =  273
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96921993644054E-01
-
-X( 1) = (  4.79176303075005E-01,  7.92052690189130E-01)
-X( 2) = (  1.26050943748302E+00,  2.02643189262909E-02)
-X( 3) = (  1.06861283863456E-01,  4.61448330863590E-02)
-X( 4) = (  9.70223573164690E-02, -9.68058783786847E-01)
-
-X( 5) = ( -1.34722676642036E-01,  2.87274241211608E-01)
-
-PATH NUMBER =       758
-
-ARCLEN =  1.42581098455774E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99899955143194E-01
-
-X( 1) = ( -5.45540714481778E-01,  9.95041182077960E-01)
-X( 2) = (  5.98874737032698E-01, -6.41763208097857E-01)
-X( 3) = (  5.78925874615783E-01,  2.06231399490198E-01)
-X( 4) = (  5.13293244100640E-01, -9.50868326731840E-01)
-
-X( 5) = ( -8.96397949283088E-02,  3.71439222415267E-01)
-
-PATH NUMBER =       759
-
-ARCLEN =  2.64064338503375E+00
-NFE =  277
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.87690397915324E-07
-
-X( 1) = ( -4.64546622979350E-02,  1.73682789789978E-01)
-X( 2) = (  9.30519391701693E-01, -1.61822681719351E+00)
-X( 3) = (  3.52930856148062E+05,  5.53414767311794E+05)
-X( 4) = (  8.34598860108172E-01,  6.40745368413928E-02)
-
-X( 5) = ( -6.41302183674794E-07,  9.06867563563640E-07)
-
-PATH NUMBER =       760
-
-ARCLEN =  1.63736558744259E+00
-NFE =  230
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.81786900567205E-10
-
-X( 1) = (  4.25074688926110E+09,  1.87948074713559E+09)
-X( 2) = (  4.81800927392784E-01, -2.81393075082189E-01)
-X( 3) = (  1.66747656046506E+09, -9.53070453368833E+08)
-X( 4) = ( -2.18797254527643E+09, -1.55254207219951E+09)
-
-X( 5) = ( -1.19401689056831E-10,  2.51362450819081E-12)
-
-PATH NUMBER =       761
-
-ARCLEN =  1.58492374582568E+00
-NFE =  386
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99570767552574E-01
-
-X( 1) = ( -3.45696812734797E-01,  7.88765222316999E-01)
-X( 2) = (  1.71818081115106E-01, -1.61141571411934E-01)
-X( 3) = (  8.00458708209302E-01,  8.81678327322249E-02)
-X( 4) = (  6.09454804872545E-01, -5.16528661258790E-01)
-
-X( 5) = ( -1.25459902659935E-01,  4.81759571340710E-01)
-
-PATH NUMBER =       762
-
-ARCLEN =  2.48825674211149E+00
-NFE =  285
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.16369951532985E-06
-
-X( 1) = ( -4.39749857992759E+05, -1.13972100203675E+05)
-X( 2) = (  7.44239099294160E-02, -2.50530025768527E-01)
-X( 3) = (  8.86380695295924E-01,  4.87455066049059E-02)
-X( 4) = (  1.42076831867965E+05,  1.41831859450380E+05)
-
-X( 5) = (  1.72663185273389E-06, -3.97596082197128E-08)
-
-PATH NUMBER =       763
-
-ARCLEN =  2.12984907658814E+00
-NFE =  372
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97160174744173E-01
-
-X( 1) = ( -4.18674902688669E-01, -2.87738360985754E-01)
-X( 2) = (  1.03318787035308E+00,  3.24192210122225E-02)
-X( 3) = ( -3.24914935155267E-01,  4.61639700537075E-01)
-X( 4) = (  6.94496033704453E-01, -7.74107207169157E-02)
-
-X( 5) = (  2.01634563672802E-01,  4.41927020068207E-01)
-
-PATH NUMBER =       764
-
-ARCLEN =  2.04518468817987E+00
-NFE =  364
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99973675793228E-01
-
-X( 1) = (  7.37821291919009E-01, -2.83798846398699E-01)
-X( 2) = (  2.79911255740946E-01, -2.91139224202108E-01)
-X( 3) = (  5.41354853518407E-01,  4.73251197537583E-01)
-X( 4) = ( -1.78508385348435E+00, -7.61942659808217E-01)
-
-X( 5) = ( -2.69078993639802E-01,  3.00748121743936E-01)
-
-PATH NUMBER =       765
-
-ARCLEN =  2.20030185328727E+00
-NFE =  354
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99878290051232E-01
-
-X( 1) = (  6.73347452375126E-01,  5.17200351656756E-01)
-X( 2) = (  5.99363287173212E-01,  3.17728887907052E-01)
-X( 3) = ( -5.21060247198515E-01,  2.44581757659163E-01)
-X( 4) = (  6.06887063354973E-01, -4.82953923895330E-01)
-
-X( 5) = (  2.67534513317726E-02,  4.78441894723737E-01)
-
-PATH NUMBER =       766
-
-ARCLEN =  1.22228555193448E+00
-NFE =  265
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98751643355648E-01
-
-X( 1) = (  3.23207046839232E-01,  4.81272547896790E-01)
-X( 2) = (  5.68370562735610E-01, -4.97948105456181E-01)
-X( 3) = (  7.38925595100325E-01,  5.79336266204603E-01)
-X( 4) = ( -2.35452336056514E-01, -1.51193587405748E+00)
-
-X( 5) = ( -1.64968399065224E-01,  2.96698520103776E-01)
-
-PATH NUMBER =       767
-
-ARCLEN =  1.42033701857392E+00
-NFE =  448
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95679012838610E-01
-
-X( 1) = (  6.21587168691250E-02,  2.14352471674331E-01)
-X( 2) = (  7.63369223778263E-01, -7.27143428857498E-02)
-X( 3) = (  3.58940820900157E-01,  2.03049284689310E-02)
-X( 4) = (  2.22399607215896E-01, -6.70298059109473E-01)
-
-X( 5) = ( -1.79764694135459E-01,  5.25936499735662E-01)
-
-PATH NUMBER =       768
-
-ARCLEN =  2.06641312398833E+00
-NFE =  230
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.39708279122442E-07
-
-X( 1) = (  7.64795766167165E-01,  8.34641714533080E-01)
-X( 2) = (  4.63158125748201E-01, -1.02064072083115E-01)
-X( 3) = ( -5.89982777515879E+05, -1.65092610687577E+06)
-X( 4) = ( -7.61480751060818E+05,  3.31105288489590E+05)
-
-X( 5) = (  1.36544432964721E-07, -4.86490951637913E-07)
-
-PATH NUMBER =       769
-
-ARCLEN =  1.81372744103225E+00
-NFE =  411
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99976011593129E-01
-
-X( 1) = ( -1.61742938406327E+00,  6.10274946844600E-01)
-X( 2) = ( -1.19644500253198E-01,  8.96027758098214E-02)
-X( 3) = (  8.89482712280205E-01,  1.00152989716103E-02)
-X( 4) = (  1.32310758770683E+00, -4.37861512509598E-01)
-
-X( 5) = (  2.58315829257151E-01,  2.95436063358361E-01)
-
-PATH NUMBER =       770
-
-ARCLEN =  1.60259332000505E+00
-NFE =  222
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.36189177123821E-10
-
-X( 1) = (  2.22499399532042E+10,  6.30160932559871E+10)
-X( 2) = (  8.26657376134264E-01, -3.63161911673231E-01)
-X( 3) = (  4.00861205627311E+10,  7.13607802910354E+09)
-X( 4) = ( -1.16175060434477E+10, -5.15308331226258E+10)
-
-X( 5) = ( -5.31150649721659E-12,  5.32207047529432E-12)
-
-PATH NUMBER =       771
-
-ARCLEN =  2.12137786811801E+00
-NFE =  383
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99904566063613E-01
-
-X( 1) = ( -1.67008492279784E+00,  4.77801680933467E-01)
-X( 2) = ( -4.78686189924393E-01, -3.69896612276668E-01)
-X( 3) = (  6.51768791913855E-01,  1.17210988275939E-01)
-X( 4) = (  8.91773246291298E-01, -1.80160927437068E-01)
-
-X( 5) = (  3.39607165877241E-01,  2.58874545249287E-01)
-
-PATH NUMBER =       772
-
-ARCLEN =  2.06471745067038E+00
-NFE =  453
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99929906531654E-01
-
-X( 1) = ( -1.27907989466001E-01,  6.98695709674800E-01)
-X( 2) = (  8.62212492662045E-01, -6.76006484299558E-02)
-X( 3) = (  6.92500986249166E-01,  8.89497148838856E-01)
-X( 4) = ( -6.21790574356605E-02, -6.26859211920587E-02)
-
-X( 5) = ( -1.01104626632567E-01,  2.29083748427155E-01)
-
-PATH NUMBER =       773
-
-ARCLEN =  2.15993851320699E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99989885477134E-01
-
-X( 1) = ( -1.69256234489508E-01, -4.32423979259321E-02)
-X( 2) = (  6.30936810041884E-01, -2.73283688000035E-02)
-X( 3) = (  1.27325358073903E+00, -6.73898733250393E-02)
-X( 4) = ( -1.33419705533859E+00, -1.96936593056540E-01)
-
-X( 5) = ( -2.53296997703961E-01,  2.61299166429822E-01)
-
-PATH NUMBER =       774
-
-ARCLEN =  4.00630560081991E+00
-NFE =  295
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99334069069073E-01
-
-X( 1) = ( -3.00495209958006E-01, -5.54622320571112E-01)
-X( 2) = (  1.19112976960057E+00, -3.01183546885101E-01)
-X( 3) = ( -1.52069027114437E-01,  9.83285593211968E-02)
-X( 4) = (  1.30755222694822E+00, -1.52079093565554E-01)
-
-X( 5) = (  1.05938028000179E+00,  1.10307794256238E+00)
-
-PATH NUMBER =       775
-
-ARCLEN =  1.39105312994277E+00
-NFE =  337
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98261896979637E-01
-
-X( 1) = ( -3.91783930136247E-02,  4.46325815317829E-03)
-X( 2) = (  1.00973393987128E+00, -9.54558538853083E-03)
-X( 3) = ( -1.08023828821863E-02,  9.63436773376911E-01)
-X( 4) = (  9.76054645082419E-01, -7.77207628525713E-01)
-
-X( 5) = (  2.64979163485365E-02,  3.71383590345392E-01)
-
-PATH NUMBER =       776
-
-ARCLEN =  1.28031966969070E+00
-NFE =  397
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97165424251860E-01
-
-X( 1) = (  5.33709548257984E-02,  3.22719623755058E-03)
-X( 2) = (  8.19120330508135E-01, -5.18610328907749E-02)
-X( 3) = (  2.26004229582958E-01,  5.52631454266314E-01)
-X( 4) = (  5.91791951854471E-01, -7.01682706902212E-01)
-
-X( 5) = ( -5.28439050210238E-02,  4.81637706484309E-01)
-
-PATH NUMBER =       777
-
-ARCLEN =  1.37626510502569E+00
-NFE =  121
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.22363758043582E-13
-
-X( 1) = ( -7.63692415776517E+09, -2.64392420433622E+10)
-X( 2) = (  4.98379664690646E-01, -2.86998725669537E-01)
-X( 3) = ( -5.56322117474857E+10, -1.77566660652885E+08)
-X( 4) = (  2.17277641794264E+09,  3.88405543257652E+10)
-
-X( 5) = (  1.02467402510013E-11, -4.74721406932763E-12)
-
-PATH NUMBER =       778
-
-ARCLEN =  1.88085829361166E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98752681591912E-01
-
-X( 1) = ( -4.99487594237086E-01,  3.14694470557850E-01)
-X( 2) = ( -3.09703830746306E-02, -1.36284715177347E-01)
-X( 3) = (  8.12610457764127E-01,  1.18774543209482E-01)
-X( 4) = (  7.88959841920634E-01, -3.39632975452124E-01)
-
-X( 5) = (  6.03942998897427E-02,  8.28192099058101E-01)
-
-PATH NUMBER =       779
-
-ARCLEN =  1.44935867080307E+00
-NFE =  297
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.71958160427934E-01
-
-X( 1) = ( -8.66689367921216E-01,  5.46110694400687E-01)
-X( 2) = ( -5.96159408056991E-01,  1.66308447318865E-01)
-X( 3) = (  7.85434104961722E-01,  1.63440041372036E-01)
-X( 4) = (  7.19720975624428E-01, -2.36455803023511E-01)
-
-X( 5) = (  2.89122805720688E-01,  4.17874686172657E-01)
-
-PATH NUMBER =       780
-
-ARCLEN =  3.04444005210695E+00
-NFE =  167
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.72928322684714E-14
-
-X( 1) = ( -1.55503105160137E+14, -2.82205543316197E+13)
-X( 2) = (  5.48391331929301E+13, -3.60273335480558E+14)
-X( 3) = ( -3.72212106219108E+13,  3.90720963017690E+14)
-X( 4) = (  6.42445162867975E-01,  3.76030250711513E-02)
-
-X( 5) = ( -8.37085392321746E-16,  3.06352165857504E-15)
-
-PATH NUMBER =       781
-
-ARCLEN =  2.59760487528129E+00
-NFE =  283
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.56930434282996E-08
-
-X( 1) = ( -3.89395288915841E+06, -1.86307145151751E+06)
-X( 2) = (  4.75556727294084E-01,  1.03962120959667E-01)
-X( 3) = (  1.95472421252812E+06,  6.14533925680923E+06)
-X( 4) = (  6.86737305528343E-01, -9.26404855232001E-01)
-
-X( 5) = (  3.85864753061466E-08,  1.09744820983137E-07)
-
-PATH NUMBER =       782
-
-ARCLEN =  9.89866097453561E+00
-NFE =  335
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999948E-01
-
-X( 1) = ( -4.75988945506640E+01, -2.73431586188735E+01)
-X( 2) = (  9.07388346251805E-01, -6.74385542302681E-02)
-X( 3) = (  1.44700056191272E-02,  3.39402200276197E-03)
-X( 4) = (  1.32385803583213E+02,  6.13823862498200E+01)
-
-X( 5) = (  5.24005407164219E-03, -6.34303906127977E-03)
-
-PATH NUMBER =       783
-
-ARCLEN =  2.34601896659235E+00
-NFE =  194
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.73528859500923E-10
-
-X( 1) = (  1.57570152195919E+09,  3.80519088393986E+08)
-X( 2) = (  5.36194500398050E-01, -3.77644533504360E-01)
-X( 3) = (  1.97445597246344E+09, -5.69866767314957E+08)
-X( 4) = ( -4.07852656312097E+09,  2.25234279025725E+09)
-
-X( 5) = ( -1.39437065219865E-10,  5.20156086172147E-12)
-
-PATH NUMBER =       784
-
-ARCLEN =  2.79254825756722E+00
-NFE =  581
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999712620787E-01
-
-X( 1) = ( -2.70965883015521E-02, -2.13647600003787E-02)
-X( 2) = (  1.01273680736643E+00, -1.50006657290972E-01)
-X( 3) = ( -7.66504622073545E-01,  3.11334266925514E+00)
-X( 4) = (  5.47835433986235E+00, -8.45338349449777E-01)
-
-X( 5) = (  1.51323577011041E-01,  2.12448776375735E-01)
-
-PATH NUMBER =       785
-
-ARCLEN =  1.63768299801401E+00
-NFE =  405
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95305888176273E-01
-
-X( 1) = (  1.35726258950197E-01, -3.36436258469607E-01)
-X( 2) = (  6.77571480475776E-01, -1.20750040628598E-01)
-X( 3) = ( -3.06706820235332E-02,  5.11149234134178E-01)
-X( 4) = (  6.24040609981914E-01, -2.52446919547295E-01)
-
-X( 5) = (  3.89820747257900E-02,  8.09762151044624E-01)
-
-PATH NUMBER =       786
-
-ARCLEN =  1.33107239848578E+00
-NFE =  296
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99439082421305E-01
-
-X( 1) = ( -1.32632815010985E-01,  1.51345117565817E-01)
-X( 2) = (  2.86940171530585E-01,  3.02936466890984E-02)
-X( 3) = (  3.41690535631870E-01,  1.10903506361738E+00)
-X( 4) = (  1.02055328713558E+00, -1.48609928221420E-02)
-
-X( 5) = (  4.15326161926504E-03,  4.24146852401352E-01)
-
-PATH NUMBER =       787
-
-ARCLEN =  2.05790571366056E+00
-NFE =  209
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.72998073266663E-08
-
-X( 1) = (  1.56176965277259E+06,  1.69542015683985E+06)
-X( 2) = ( -3.21804720898550E-02,  1.32626064792409E-01)
-X( 3) = (  4.65013623256782E+06, -7.13772028023247E+05)
-X( 4) = (  9.67350259082927E-01, -6.18495034875915E-02)
-
-X( 5) = ( -1.08342223343298E-07, -2.00232853626685E-10)
-
-PATH NUMBER =       788
-
-ARCLEN =  3.85469103367552E+00
-NFE =  281
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999976949E-01
-
-X( 1) = ( -2.30459521026292E-01, -2.04363280498474E-02)
-X( 2) = (  2.02434156654046E+02, -2.15296600193323E+02)
-X( 3) = ( -1.40652138746740E+01,  1.31046067400103E+02)
-X( 4) = (  8.89715760033982E-01, -1.05001879695285E-03)
-
-X( 5) = ( -2.56396155472494E-03,  1.06251159923329E-03)
-
-PATH NUMBER =       789
-
-ARCLEN =  6.77820626928311E+00
-NFE =  246
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.65802739564546E-09
-
-X( 1) = (  1.01423188110015E+08,  7.88929671997022E+06)
-X( 2) = (  4.45315901322572E+06,  8.88761848578888E+07)
-X( 3) = ( -1.44621867314866E+00,  1.59414265137073E-01)
-X( 4) = (  6.34363588302567E-01, -3.54948812810977E-05)
-
-X( 5) = ( -1.11728396792927E-08,  6.01866269274226E-09)
-
-PATH NUMBER =       790
-
-ARCLEN =  2.38245003529245E+00
-NFE =  178
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.60486909179406E-12
-
-X( 1) = ( -2.91614902614712E+11, -7.64865805000884E+10)
-X( 2) = ( -1.80712358315110E+11,  1.34863982162177E+10)
-X( 3) = (  3.29668525258930E+11,  3.26688633065871E+11)
-X( 4) = (  4.94938925597869E-01, -3.28363949204051E-03)
-
-X( 5) = (  7.42951219209059E-13,  2.49306239714919E-12)
-
-PATH NUMBER =       791
-
-ARCLEN =  3.59870024658578E+00
-NFE =  653
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96263879603526E-01
-
-X( 1) = (  4.47759352324200E-02, -2.86878203802917E-01)
-X( 2) = (  4.77386386868156E-01, -3.46286279849996E-01)
-X( 3) = ( -4.90510147739468E-01,  4.27239081049944E-01)
-X( 4) = (  8.71177373103916E-01,  3.88910019265174E-02)
-
-X( 5) = (  7.18776864885758E-01,  7.09555716129033E-01)
-
-PATH NUMBER =       792
-
-ARCLEN =  3.49084620351515E+00
-NFE =  643
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98744586547263E-01
-
-X( 1) = (  1.32851647633008E-01, -7.37979725658234E-01)
-X( 2) = (  1.00143896041119E-01, -1.90886996244139E-01)
-X( 3) = ( -6.97256550166597E-01, -5.89414059710477E-02)
-X( 4) = (  9.91030839776254E-01,  5.17688953836843E-03)
-
-X( 5) = (  4.94220679421941E-01, -2.28365344000554E-01)
-
-PATH NUMBER =       793
-
-ARCLEN =  4.70706339131860E+00
-NFE =  464
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99942356095894E-01
-
-X( 1) = (  7.35607165438075E-01, -2.22332888482458E-01)
-X( 2) = ( -1.84410363635895E-01, -2.76552213746569E-01)
-X( 3) = ( -9.90483900300753E-01, -3.99028836728646E-01)
-X( 4) = (  9.04421225818177E-01,  2.24514868239337E-01)
-
-X( 5) = (  4.12594308741750E-01, -4.52706589681599E-01)
-
-PATH NUMBER =       794
-
-ARCLEN =  2.34023968372997E+00
-NFE =  277
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96254451581247E-01
-
-X( 1) = (  5.13706391873098E-01, -3.18516913507231E-01)
-X( 2) = (  7.34494250636605E-01, -2.33075898662725E-02)
-X( 3) = ( -1.67152278077562E-01,  3.37824051106005E-01)
-X( 4) = (  3.44852942882870E-01, -5.96545367386756E-02)
-
-X( 5) = ( -3.10306674215596E-01,  8.43289027232421E-01)
-
-PATH NUMBER =       795
-
-ARCLEN =  1.91607861630002E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999629083349E-01
-
-X( 1) = (  4.85783271943720E-01, -2.52256385032149E-02)
-X( 2) = (  9.00073686198350E-03, -1.34540917958882E-01)
-X( 3) = (  1.76656999189037E+00,  1.51069397314147E+00)
-X( 4) = (  9.84288780204668E-01,  6.13153780294761E-02)
-
-X( 5) = ( -2.52845546959517E-01,  1.86863421852867E-01)
-
-PATH NUMBER =       796
-
-ARCLEN =  4.21610132264478E+00
-NFE =  661
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997269825675E-01
-
-X( 1) = (  6.64547927669342E-01,  1.54100115737419E+00)
-X( 2) = ( -3.74806318398662E-01, -4.34840812125986E-01)
-X( 3) = (  5.00631613319870E-01,  4.53262293609892E-01)
-X( 4) = (  9.62560001426834E-01, -5.93246692143021E-02)
-
-X( 5) = ( -2.64023728798441E-01,  2.97681938451604E-01)
-
-PATH NUMBER =       797
-
-ARCLEN =  2.76126987171803E+00
-NFE =  239
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.33783496741906E-07
-
-X( 1) = (  7.16483995306150E-01, -1.88376720332369E-01)
-X( 2) = ( -1.45345510026121E+08, -4.16759009214537E+07)
-X( 3) = ( -6.29142522674472E+07,  1.01763832167913E+08)
-X( 4) = (  1.06706265895952E+00, -6.63015103041639E-02)
-
-X( 5) = (  5.56051691670556E-09, -9.57221762791505E-11)
-
-PATH NUMBER =       798
-
-ARCLEN =  4.55877579695069E+00
-NFE =  168
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.18195541535389E-09
-
-X( 1) = ( -1.11803721388721E+00, -2.12966382232082E+00)
-X( 2) = (  1.60960771829775E+09, -1.18168945595084E+09)
-X( 3) = ( -3.83080544740629E+09,  5.42804257072891E+08)
-X( 4) = (  6.19466001930945E-01, -1.28792445498036E-03)
-
-X( 5) = (  3.01431439054048E-10,  1.18868442378680E-10)
-
-PATH NUMBER =       799
-
-ARCLEN =  4.01902764020844E+00
-NFE =   89
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.03123005504032E-14
-
-X( 1) = (  2.16491166509188E+14, -7.11163456952162E+12)
-X( 2) = (  3.45029772445332E+14,  6.83821814999535E+13)
-X( 3) = ( -3.69603675659665E+14, -2.78247044284916E+14)
-X( 4) = (  3.91719413184037E-01,  8.38280771460201E-02)
-
-X( 5) = ( -1.69027118690490E-16, -6.03255509781797E-15)
-
-PATH NUMBER =       800
-
-ARCLEN =  6.38831553912874E+00
-NFE =  236
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.43879619450403E-12
-
-X( 1) = (  1.86513938766484E+11,  1.59104888379040E+11)
-X( 2) = (  3.45454494555875E+10,  8.05808735678001E+10)
-X( 3) = ( -9.58457548281714E+10, -2.18353312569462E+11)
-X( 4) = (  5.04742959057325E-01, -1.50736535611192E-02)
-
-X( 5) = ( -4.71040044534680E-12, -3.09929393347425E-12)
-
-PATH NUMBER =       801
-
-ARCLEN =  5.08754961326881E+00
-NFE =  448
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999311376738E-01
-
-X( 1) = (  6.78041142667406E-02, -8.25424276746552E-02)
-X( 2) = (  1.15676001879951E+00, -2.57296867969459E-01)
-X( 3) = ( -6.89150388011626E-01,  2.11821900553904E+00)
-X( 4) = (  4.39049070465567E+00,  4.83847065827006E-01)
-
-X( 5) = (  2.08662212635575E-01,  4.38592626595682E-01)
-
-PATH NUMBER =       802
-
-ARCLEN =  3.61990015105887E+00
-NFE =  216
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.38952697031637E-12
-
-X( 1) = (  5.13437668075859E-01,  9.85211907250110E-03)
-X( 2) = ( -4.84368252039541E+12,  3.78232559530734E+12)
-X( 3) = (  4.49646092241158E+12, -4.35546595390880E+12)
-X( 4) = ( -3.67462343240017E+12, -1.05613458749556E+11)
-
-X( 5) = (  2.02697559258114E-14, -2.21415442404338E-13)
-
-PATH NUMBER =       803
-
-ARCLEN =  2.64018892663758E+00
-NFE =  316
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98843975383860E-01
-
-X( 1) = (  9.28545820551855E-01, -2.23115823604353E-02)
-X( 2) = (  4.00349588758411E-01, -2.36221053786063E-01)
-X( 3) = ( -2.05773950068602E-02,  1.88632629926907E-01)
-X( 4) = ( -2.36115265292030E-02, -1.08554083523297E-01)
-
-X( 5) = ( -6.05725099253179E-01,  3.75914620302447E-01)
-
-PATH NUMBER =       804
-
-ARCLEN =  1.71977401199230E+00
-NFE =  258
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972778972264E-01
-
-X( 1) = (  4.45244847743154E-01,  2.23984203007929E-01)
-X( 2) = ( -4.57685029240166E-01, -1.69902702587501E+00)
-X( 3) = (  1.68944816958144E+00,  1.46176776770470E+00)
-X( 4) = (  5.76758218921172E-01, -2.92253829725636E-01)
-
-X( 5) = ( -2.97127253669573E-01,  6.59617540703918E-02)
-
-PATH NUMBER =       805
-
-ARCLEN =  2.28696900672080E+00
-NFE =  406
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99976987426166E-01
-
-X( 1) = (  4.63910953854950E-01,  5.75938068768091E-01)
-X( 2) = ( -2.14002543140010E-01, -1.52482531087317E-01)
-X( 3) = (  7.23851982053689E-01,  9.83374503567521E-01)
-X( 4) = (  1.02905636558516E+00, -1.77082197378495E-02)
-
-X( 5) = ( -2.49160010220890E-01,  3.91181077302179E-01)
-
-PATH NUMBER =       806
-
-ARCLEN =  2.07851643363436E+00
-NFE =  191
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.65259554198218E-07
-
-X( 1) = (  2.09955183094773E+05, -9.46147812028273E+05)
-X( 2) = (  1.61322832200221E-01, -7.61788884375127E-02)
-X( 3) = ( -1.63978460900556E+06, -1.70458357022346E+06)
-X( 4) = (  7.91196615689338E-01, -1.57816892897508E-03)
-
-X( 5) = (  1.35336857023461E-07, -1.82616987172987E-07)
-
-PATH NUMBER =       807
-
-ARCLEN =  2.67680213073165E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99985757561954E-01
-
-X( 1) = (  6.03090405635776E-01, -9.39806991149806E-02)
-X( 2) = ( -9.47534337260869E-01, -1.35973452559768E-01)
-X( 3) = (  1.93947175964423E+00, -5.44739014434284E-01)
-X( 4) = (  5.11597506901589E-01,  7.13346150657088E-03)
-
-X( 5) = ( -3.13793027831857E-01, -2.41184507302793E-01)
-
-PATH NUMBER =       808
-
-ARCLEN =  5.70482971118630E+00
-NFE =   85
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.73391487346670E-14
-
-X( 1) = ( -7.21724062825568E+15, -4.67001203812692E+14)
-X( 2) = ( -1.15438907395745E+16, -1.14577914157950E+16)
-X( 3) = (  9.18121711695597E+15,  1.44683092212179E+16)
-X( 4) = ( -1.81640977946814E+00,  3.34720699089144E+00)
-
-X( 5) = ( -1.25740346954006E-16,  1.95102180938767E-16)
-
-PATH NUMBER =       809
-
-ARCLEN =  4.76802614365265E+01
-NFE =  211
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.44314572075451E-13
-
-X( 1) = (  7.10541637454924E+13, -1.64746433849822E+13)
-X( 2) = (  8.77414288519070E+13, -1.38456235779694E+13)
-X( 3) = ( -1.05699776099647E+14, -1.96375267682282E+13)
-X( 4) = (  5.43984264564146E-01,  1.11753429813473E-02)
-
-X( 5) = ( -1.84548828042336E-14, -2.07855651093714E-14)
-
-PATH NUMBER =       810
-
-ARCLEN =  9.98702528096995E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999985E-01
-
-X( 1) = (  9.67140145161691E-01, -4.29143980348237E-01)
-X( 2) = ( -6.15207976441382E+01, -1.25362587607180E+02)
-X( 3) = (  8.33725939158238E-02,  1.25281027825213E-02)
-X( 4) = (  9.37333813328473E-01,  3.91089376000157E-01)
-
-X( 5) = ( -1.43018816060637E-03, -5.89089638614304E-03)
-
-PATH NUMBER =       811
-
-ARCLEN =  4.95511238278205E+00
-NFE =  212
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.07718192394248E-08
-
-X( 1) = (  9.06248312395137E-02, -2.62105152234904E-02)
-X( 2) = (  8.24410740014837E+06, -7.65143701150068E+07)
-X( 3) = ( -7.97306935138815E+07,  1.09341739464808E+08)
-X( 4) = (  9.10829836086455E-01,  1.66186000889803E-02)
-
-X( 5) = (  3.78266562474014E-09,  9.33842958652587E-09)
-
-PATH NUMBER =       812
-
-ARCLEN =  1.76368136126959E+00
-NFE =  193
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95047131554708E-01
-
-X( 1) = (  7.81556176010240E-01,  3.69979408845978E-02)
-X( 2) = (  6.84283456420458E-01, -2.35909799309343E-01)
-X( 3) = ( -4.89864909031612E-01,  1.37476856589050E-01)
-X( 4) = (  2.24212259793051E-02, -6.29679285515305E-02)
-
-X( 5) = ( -4.39950164479020E-01,  6.86168224749780E-01)
-
-PATH NUMBER =       813
-
-ARCLEN =  2.28370203245032E+00
-NFE =  369
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999931419055E-01
-
-X( 1) = (  3.94103717255256E+00, -7.99687626415127E-01)
-X( 2) = (  5.44885122405975E-01, -1.11529152993902E-01)
-X( 3) = (  6.18982666415517E-01,  6.86762668199668E-01)
-X( 4) = ( -8.08751309311337E-01, -4.67927044276977E-01)
-
-X( 5) = ( -1.79644653021144E-01, -1.73450861060879E-02)
-
-PATH NUMBER =       814
-
-ARCLEN =  1.54857650409354E+00
-NFE =  208
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.01357725958174E-09
-
-X( 1) = ( -3.04339034473126E+07, -2.52550976693375E+08)
-X( 2) = (  4.34569126619908E-01, -2.40962719697136E-01)
-X( 3) = (  1.66635386486674E+07, -1.60979822861229E+08)
-X( 4) = ( -5.19280892731286E+07,  5.60668473253184E+06)
-
-X( 5) = (  5.55826898125233E-10, -1.84815706277342E-09)
-
-PATH NUMBER =       815
-
-ARCLEN =  2.36048481038205E+00
-NFE =  506
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997617596153E-01
-
-X( 1) = (  1.92696789525749E+00,  6.51366515184234E-02)
-X( 2) = ( -2.65191345700719E-01,  1.05679863327423E-02)
-X( 3) = (  1.05516699474421E+00, -1.46021922267932E-02)
-X( 4) = (  3.55425664719636E-01, -4.08876825220368E-01)
-
-X( 5) = ( -3.35881836755148E-01, -5.20834136468441E-02)
-
-PATH NUMBER =       816
-
-ARCLEN =  1.72960523161859E+00
-NFE =  144
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.06014707381863E-14
-
-X( 1) = ( -8.34140158091568E+12,  6.15174668551648E+10)
-X( 2) = (  2.91928724803351E+12, -1.65105186506219E+13)
-X( 3) = ( -7.60191879560244E+12,  2.29845968488388E+13)
-X( 4) = (  5.52263291777542E-01, -3.81304402112533E-03)
-
-X( 5) = (  7.34392473049350E-15,  4.04232311686237E-14)
-
-PATH NUMBER =       817
-
-ARCLEN =  2.61348763938197E+00
-NFE =  130
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.94467754300679E-14
-
-X( 1) = (  3.00499153191484E+12,  1.22942834051528E+13)
-X( 2) = ( -8.01176990042145E+12,  2.51837451737208E+13)
-X( 3) = (  2.81008308148958E+13, -2.42979093679183E+13)
-X( 4) = (  5.09257303159666E-01, -2.41640386787354E-02)
-
-X( 5) = ( -4.47250472334487E-14, -9.52872763332335E-15)
-
-PATH NUMBER =       818
-
-ARCLEN =  4.20482136556975E+01
-NFE =  331
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.13610647979668E-14
-
-X( 1) = (  5.58704053851342E+13,  2.39512304088182E+13)
-X( 2) = (  7.95578059053670E+13,  5.84329329736310E+13)
-X( 3) = ( -6.08332710215828E+13, -1.14696882790386E+14)
-X( 4) = (  4.60598382117654E-01,  3.23654793221556E-03)
-
-X( 5) = ( -9.65931978499923E-15, -1.92130382783984E-14)
-
-PATH NUMBER =       819
-
-ARCLEN =  2.86007092807758E+00
-NFE =  412
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988097040401E-01
-
-X( 1) = (  5.14949190447893E-01,  1.80592445864544E-01)
-X( 2) = (  1.02839437385632E+00, -1.70389383014088E+00)
-X( 3) = ( -1.74331615645825E+00,  2.06386622821021E+00)
-X( 4) = (  4.82053851015422E-01, -3.64039012070544E-01)
-
-X( 5) = (  7.07476098911554E-03,  3.50965894746927E-01)
-
-PATH NUMBER =       820
-
-ARCLEN =  1.59154327674051E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94646448467777E-01
-
-X( 1) = (  5.93045380839125E-01,  1.05017457437775E-01)
-X( 2) = (  1.27775560874220E+00, -5.11289214402648E-01)
-X( 3) = ( -9.52366466259018E-01,  2.29891076403593E-01)
-X( 4) = (  1.72876799900357E-01, -2.95136089505786E-01)
-
-X( 5) = ( -1.59373857948617E-01,  5.99622862836323E-01)
-
-PATH NUMBER =       821
-
-ARCLEN =  1.42765070566515E+00
-NFE =  242
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96839744990568E-01
-
-X( 1) = (  8.07024918721520E-01,  3.70880869920803E-01)
-X( 2) = (  8.45212641026931E-01, -1.46788523538032E-01)
-X( 3) = ( -2.08687153024609E-01, -3.59479510584452E-03)
-X( 4) = ( -1.81404746752089E-01, -3.54301221585058E-01)
-
-X( 5) = ( -2.98581370277196E-01,  3.91032121690571E-01)
-
-PATH NUMBER =       822
-
-ARCLEN =  1.48609827281303E+00
-NFE =  276
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99748615572374E-01
-
-X( 1) = (  6.30480976604675E-01,  7.92116172336071E-01)
-X( 2) = (  9.20416762505623E-01, -9.91173270061283E-02)
-X( 3) = ( -1.52027182647002E-01,  4.01120607379341E-01)
-X( 4) = (  4.61500399375952E-02, -1.17956301504833E-01)
-
-X( 5) = ( -1.53444540270046E-01,  2.87248776214154E-01)
-
-PATH NUMBER =       823
-
-ARCLEN =  2.71731530377950E+00
-NFE =  321
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996844933942E-01
-
-X( 1) = (  9.65627203888373E-01,  1.99923121720801E+00)
-X( 2) = ( -1.15112702217878E+00,  6.18105853072330E-03)
-X( 3) = (  6.71893254288282E-01, -1.21023586562592E-01)
-X( 4) = (  5.29228567506294E-01,  3.10178023826307E-01)
-
-X( 5) = ( -3.39480187456594E-01,  2.74956029102082E-01)
-
-PATH NUMBER =       824
-
-ARCLEN =  1.61548888098963E+00
-NFE =  350
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99982843339208E-01
-
-X( 1) = (  1.06695930551818E+00,  5.36550094465678E-01)
-X( 2) = (  4.74229613639327E-01, -2.46649346416046E-01)
-X( 3) = (  7.63918512395918E-01,  3.07743649690279E-01)
-X( 4) = ( -2.38709076933113E-01,  1.85340915472776E-01)
-
-X( 5) = ( -2.60002848319611E-01,  1.33004806167886E-01)
-
-PATH NUMBER =       825
-
-ARCLEN =  4.14385297554439E+00
-NFE =  249
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.17662698681099E-13
-
-X( 1) = (  4.97873760991771E+11,  3.85781621811553E+11)
-X( 2) = ( -2.58170564674730E+11,  6.06205984969052E+11)
-X( 3) = (  2.45186685508953E+11, -5.52933957721044E+10)
-X( 4) = (  4.94421413359812E-01,  1.28278601007804E-03)
-
-X( 5) = ( -1.05892058359716E-12,  1.03102850692802E-12)
-
-PATH NUMBER =       826
-
-ARCLEN =  5.24445314879482E+00
-NFE =  644
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99936805984842E-01
-
-X( 1) = (  4.98661549503780E-01, -6.76640315536410E-01)
-X( 2) = (  6.11012008526092E-01,  7.25215534618398E-02)
-X( 3) = ( -1.42016844050581E+00, -6.64621906182832E-02)
-X( 4) = ( -1.55212804706379E+00,  1.30927656541515E+00)
-
-X( 5) = (  6.01636140801311E-01,  8.93578694094935E-01)
-
-PATH NUMBER =       827
-
-ARCLEN =  4.47842998834695E+01
-NFE =  425
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.28928904805318E-07
-
-X( 1) = ( -1.97717982026650E+06,  1.46851071260718E+06)
-X( 2) = ( -1.49759288511644E+07, -1.31021258867012E+07)
-X( 3) = ( -5.59399990616290E-01,  6.46068074024940E+00)
-X( 4) = (  6.44661930476770E-01, -1.46166047813753E-01)
-
-X( 5) = (  1.24280948950357E-08, -4.63341242783405E-08)
-
-PATH NUMBER =       828
-
-ARCLEN =  2.64286853704645E+00
-NFE =  113
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.85028095908808E-14
-
-X( 1) = (  4.74040953095006E-01, -4.53372513640092E-03)
-X( 2) = (  1.41606015212388E+14,  3.57194448181180E+13)
-X( 3) = ( -1.11197005697846E+14, -4.10056202321527E+13)
-X( 4) = (  6.43615289353698E+13,  8.85298677412767E+12)
-
-X( 5) = (  9.23135808246489E-15,  7.35240861249320E-15)
-
-PATH NUMBER =       829
-
-ARCLEN =  1.73936370842094E+00
-NFE =  357
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99934010198919E-01
-
-X( 1) = (  1.01970262477348E+00,  1.68683382720822E+00)
-X( 2) = (  1.05118012857062E+00,  2.44796721458494E-03)
-X( 3) = ( -2.01401993913790E-02,  1.66854977237844E-02)
-X( 4) = ( -4.73169529256239E-01, -1.63600588863426E+00)
-
-X( 5) = ( -1.00444048470159E-01,  2.02919528217401E-01)
-
-PATH NUMBER =       830
-
-ARCLEN =  1.70897965541112E+00
-NFE =  440
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99975732322022E-01
-
-X( 1) = (  2.35448871676129E-02,  1.12869855244488E+00)
-X( 2) = (  7.00655129553826E-01,  1.69206624106330E-02)
-X( 3) = ( -7.02380644729685E-02, -4.97841772793671E-02)
-X( 4) = (  7.62290485484699E-01, -4.29715985357257E-01)
-
-X( 5) = ( -4.89906414374371E-02,  3.96021229665466E-01)
-
-PATH NUMBER =       831
-
-ARCLEN =  1.66469646117522E+00
-NFE =  410
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995443646780E-01
-
-X( 1) = (  3.49006054263516E-01,  1.71536353749919E+00)
-X( 2) = (  1.09486483713424E+00,  5.53352499524547E-02)
-X( 3) = (  8.16315815280582E-02,  2.97944960191346E-01)
-X( 4) = (  1.13096927811309E-01, -5.95625862929021E-02)
-
-X( 5) = ( -9.57682880335135E-02,  1.98360201199166E-01)
-
-PATH NUMBER =       832
-
-ARCLEN =  2.24616809473155E+00
-NFE =  477
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.86537381758344E-07
-
-X( 1) = ( -5.74266560898699E+06, -4.43437773549820E+06)
-X( 2) = (  1.27473071570942E+00, -1.44198895987037E-01)
-X( 3) = ( -3.95735310511562E+06, -1.12323053144512E+06)
-X( 4) = (  9.75860644886455E-02, -3.22098908844271E-02)
-
-X( 5) = (  6.22361738346669E-08, -1.50447760366304E-08)
-
-PATH NUMBER =       833
-
-ARCLEN =  1.97271039678146E+00
-NFE =  335
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999968955672E-01
-
-X( 1) = ( -2.35301056150588E+00,  3.82184333639173E+00)
-X( 2) = ( -4.60470828867186E-01, -1.61148469957303E-01)
-X( 3) = (  6.87707535131070E-01,  1.40456054584330E-01)
-X( 4) = (  7.76833443124007E-01, -1.40891359512690E-01)
-
-X( 5) = (  2.23647567868881E-02,  1.55822045174512E-01)
-
-PATH NUMBER =       834
-
-ARCLEN =  3.87959116700099E+00
-NFE =  370
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.58913794915466E-06
-
-X( 1) = (  5.23265081330010E+05, -3.38761670148158E+05)
-X( 2) = ( -3.25545267887687E+00, -2.56182491701768E+00)
-X( 3) = (  8.12575803950876E-01,  1.79044399807310E-02)
-X( 4) = ( -5.43640808304738E-01,  2.11234700782610E-01)
-
-X( 5) = ( -6.40066999005974E-07, -9.75541196303277E-07)
-
-PATH NUMBER =       835
-
-ARCLEN =  3.66219671267961E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999941171E-01
-
-X( 1) = (  3.52068606090330E-02,  1.23230946779450E-01)
-X( 2) = (  1.01555527421624E+00, -5.13933930314893E-02)
-X( 3) = ( -1.05206232463296E-01, -2.66130000519038E-01)
-X( 4) = ( -1.00370655528703E+01, -3.35715360970407E+00)
-
-X( 5) = ( -2.28008505801899E-02,  1.26546158713420E-01)
-
-PATH NUMBER =       836
-
-ARCLEN =  3.21277785843939E+00
-NFE =  418
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99882619675201E-01
-
-X( 1) = (  1.39517728899166E-01,  4.88511175905203E-02)
-X( 2) = (  1.10561815296281E+00,  4.67120373991503E-01)
-X( 3) = ( -1.16262534240630E+00, -1.08237528951998E+00)
-X( 4) = (  1.23661517138949E+00, -5.57538581420719E-01)
-
-X( 5) = (  5.25940391356179E-01,  5.96749850560775E-02)
-
-PATH NUMBER =       837
-
-ARCLEN =  1.95199725245678E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97540347677039E-01
-
-X( 1) = ( -3.50981854127429E-02, -4.69998131522734E-02)
-X( 2) = (  1.88849028636179E+00,  1.19467507409154E+00)
-X( 3) = ( -1.47055636627330E+00, -1.12298472027439E+00)
-X( 4) = (  9.16707015558824E-01, -3.70719251187952E-02)
-
-X( 5) = (  3.28298779226239E-01,  2.29263709531890E-01)
-
-PATH NUMBER =       838
-
-ARCLEN =  1.33356325776785E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97598164014934E-01
-
-X( 1) = (  7.62283772042936E-02,  7.21820334591632E-01)
-X( 2) = (  8.92176743881302E-01, -7.57315630081560E-02)
-X( 3) = (  1.30765608254075E-02,  4.36738500081363E-02)
-X( 4) = (  4.30768731057713E-01, -1.05711238814965E+00)
-
-X( 5) = ( -4.28001085954359E-02,  3.99582223954981E-01)
-
-PATH NUMBER =       839
-
-ARCLEN =  1.32351432392574E+00
-NFE =  311
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97101636267252E-01
-
-X( 1) = (  1.63594760050357E-01,  7.17321509383685E-01)
-X( 2) = (  8.69498279626171E-01, -5.55830487643699E-02)
-X( 3) = (  3.41229525381735E-02,  3.17047318279253E-02)
-X( 4) = (  3.18800878080568E-01, -1.07055690208976E+00)
-
-X( 5) = ( -6.21821447966625E-02,  3.95581470458983E-01)
-
-PATH NUMBER =       840
-
-ARCLEN =  1.40440867844670E+00
-NFE =  478
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99543141803648E-01
-
-X( 1) = (  6.07684978221374E-01,  6.39566266038274E-01)
-X( 2) = (  8.70520378876687E-01, -1.19490745821355E-02)
-X( 3) = ( -3.55205305246046E-02,  3.04529127855421E-01)
-X( 4) = ( -5.53691150905928E-02, -2.08442502684334E-01)
-
-X( 5) = ( -1.66631839106733E-01,  3.08526052002252E-01)
-
-PATH NUMBER =       841
-
-ARCLEN =  1.94886996463803E+00
-NFE =  259
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999984367E-01
-
-X( 1) = ( -2.05383261715283E+01,  4.21692992715956E+01)
-X( 2) = (  4.54339270084747E-01, -1.08911917625107E-01)
-X( 3) = (  7.33510628097523E-01,  9.68457940908094E-01)
-X( 4) = (  1.90498658200511E+01, -1.08476952074562E+01)
-
-X( 5) = (  3.30186215667009E-03,  1.61013571711699E-02)
-
-PATH NUMBER =       842
-
-ARCLEN =  2.16153752483605E+00
-NFE =  246
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.41219479146040E-06
-
-X( 1) = (  3.71971384625215E-01,  1.13067431440012E+00)
-X( 2) = (  4.45009492681576E-01, -8.70292213264651E-02)
-X( 3) = (  7.68407015073984E+04, -1.32928353618036E+06)
-X( 4) = (  1.13266691308431E+06,  1.49043570813948E+06)
-
-X( 5) = ( -6.15545355590582E-08, -3.41975261352527E-07)
-
-PATH NUMBER =       843
-
-ARCLEN =  1.58163393230143E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99509647451173E-01
-
-X( 1) = ( -2.19966587780822E-01, -2.69206894909462E-01)
-X( 2) = (  5.68541924225842E-01,  3.42240198470944E-01)
-X( 3) = ( -1.31931854287931E+00,  8.42152536011513E-02)
-X( 4) = (  8.66154355272046E-01, -1.25243626076822E-01)
-
-X( 5) = (  3.09915136545255E-01,  1.35978006661810E-01)
-
-PATH NUMBER =       844
-
-ARCLEN =  2.27656934890770E+00
-NFE =  265
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.28670388750419E-08
-
-X( 1) = ( -6.62511674179248E-02,  7.06109334266977E-02)
-X( 2) = (  7.72711018704125E-01, -1.32797702335652E-01)
-X( 3) = (  3.41139834753157E+06,  1.62439214578021E+07)
-X( 4) = ( -1.36918378564767E+07,  5.36201581779103E+06)
-
-X( 5) = ( -1.32162224821810E-08,  3.00159352962528E-08)
-
-PATH NUMBER =       845
-
-ARCLEN =  2.00350265548859E+00
-NFE =  269
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93373204140654E-01
-
-X( 1) = ( -1.33485734466893E-01, -3.95447087990949E-01)
-X( 2) = (  9.95635303707555E-01,  5.63732050991475E-02)
-X( 3) = ( -3.57034556296601E-01, -4.27668571985971E-02)
-X( 4) = (  7.86219326134441E-01, -2.21922142265352E-02)
-
-X( 5) = (  5.99350041929896E-01,  7.22827257515703E-01)
-
-PATH NUMBER =       846
-
-ARCLEN =  2.71658753690968E+00
-NFE =  352
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99938251021495E-01
-
-X( 1) = (  7.92166994766349E-01,  8.82204033752695E-01)
-X( 2) = (  6.05511435798781E-01, -1.90308264851855E-01)
-X( 3) = ( -9.70603929367091E-01, -5.72278148822252E-01)
-X( 4) = ( -7.29898768706192E-01, -2.07543069915262E+00)
-
-X( 5) = (  1.17275764951596E-01,  4.51534266456912E-01)
-
-PATH NUMBER =       847
-
-ARCLEN =  2.29935739756197E+00
-NFE =  233
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.02984723581869E-07
-
-X( 1) = ( -1.82138079383854E+06,  1.79394585833019E+07)
-X( 2) = (  5.42337106928248E-01, -2.31477298722638E-01)
-X( 3) = ( -4.05787443336379E+06,  1.81661002898332E+06)
-X( 4) = ( -5.62968154992088E+05, -4.46698366614551E+07)
-
-X( 5) = (  1.09893124804021E-08,  1.97634403619005E-08)
-
-PATH NUMBER =       848
-
-ARCLEN =  2.10946917647391E+00
-NFE =  529
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999205386797E-01
-
-X( 1) = (  3.90576228432779E-01,  2.15987573793906E-01)
-X( 2) = (  4.00206558995610E-01, -4.02708370049177E-01)
-X( 3) = ( -1.56678516298650E+00,  2.42453731909707E+00)
-X( 4) = (  1.63336842161682E+00,  1.12843258944869E-01)
-
-X( 5) = (  1.09546824464547E-01,  2.44396817972199E-01)
-
-PATH NUMBER =       849
-
-ARCLEN =  1.70660156720601E+00
-NFE =  333
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995683449982E-01
-
-X( 1) = (  1.10802956555371E+00,  1.18499124976316E+00)
-X( 2) = (  3.50087897600686E-01, -1.91832575015756E-01)
-X( 3) = (  3.07905087210778E-01,  1.48055872536484E+00)
-X( 4) = (  1.07140844189504E+00, -7.38714535195860E-01)
-
-X( 5) = ( -1.20537544890262E-01,  2.20217357203668E-01)
-
-PATH NUMBER =       850
-
-ARCLEN =  1.13140024298039E+00
-NFE =  100
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.26466851240291E-13
-
-X( 1) = ( -1.44007476538584E+11,  8.60785906864919E+11)
-X( 2) = (  5.00637833126001E-01, -2.88863999025626E-01)
-X( 3) = (  9.75356818525065E+11,  4.98178605814164E+11)
-X( 4) = (  7.40090974429212E+10, -8.17041991576631E+11)
-
-X( 5) = ( -2.27724740106683E-13,  3.69419230449031E-13)
-
-PATH NUMBER =       851
-
-ARCLEN =  2.71031646633490E+00
-NFE =  314
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999940E-01
-
-X( 1) = ( -1.46981344769757E+02,  4.62047415853859E+00)
-X( 2) = ( -3.68795376839909E-02, -2.51771792714413E-01)
-X( 3) = (  9.78584893338226E-01,  9.12111892648669E-03)
-X( 4) = (  6.82978483385282E+01,  8.22353405516636E+01)
-
-X( 5) = (  6.20216933317116E-03,  1.17014179746427E-03)
-
-PATH NUMBER =       852
-
-ARCLEN =  1.79393308857479E+00
-NFE =  213
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.63194679294686E-13
-
-X( 1) = (  1.24743568533011E+13,  8.34490482095866E+12)
-X( 2) = ( -1.64459639612654E+13, -2.31725629672692E+12)
-X( 3) = (  3.21954558982562E+13,  1.82275656988352E+12)
-X( 4) = (  4.32014236209066E-01, -4.04292603357416E-02)
-
-X( 5) = ( -1.86770900394845E-14, -3.80137544706005E-15)
-
-PATH NUMBER =       853
-
-ARCLEN =  2.28055221605275E+00
-NFE =  279
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.00726122674751E-07
-
-X( 1) = ( -1.08024642633950E-01,  1.29882242342422E-01)
-X( 2) = (  8.33709655695268E-01, -1.19907604451011E-01)
-X( 3) = (  2.22919362348782E+05,  1.01356128253081E+06)
-X( 4) = ( -1.07271182645203E+06, -8.60847546448306E+05)
-
-X( 5) = ( -4.18711307038086E-08,  4.55114159632493E-07)
-
-PATH NUMBER =       854
-
-ARCLEN =  2.59118381886568E+00
-NFE =  256
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.98196052343480E-09
-
-X( 1) = ( -2.60135968447664E+07,  6.86102337927516E+06)
-X( 2) = (  7.29045239889782E-01, -5.71612252395083E-02)
-X( 3) = ( -2.13401748780579E-01,  2.38219958999314E-01)
-X( 4) = (  2.48574400956881E+07, -6.32314760338969E+06)
-
-X( 5) = (  2.36040589441776E-08,  6.95746606740833E-09)
-
-PATH NUMBER =       855
-
-ARCLEN =  4.43663599494637E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999988917E-01
-
-X( 1) = (  1.07704547733161E-02, -9.03298197150310E-03)
-X( 2) = (  9.08939142687218E-01,  4.68794657617990E-02)
-X( 3) = ( -6.69021751186563E+00,  1.24118625086999E+01)
-X( 4) = (  3.52461790417113E+01, -1.46351489918785E+00)
-
-X( 5) = (  5.47173447255425E-02,  1.81717261524455E-03)
-
-PATH NUMBER =       856
-
-ARCLEN =  1.48294316437412E+00
-NFE =  330
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99778976319609E-01
-
-X( 1) = (  6.22691551431958E-02, -5.95302716897998E-02)
-X( 2) = (  1.18501351321706E+00, -1.79427830563028E-01)
-X( 3) = ( -1.86882278161147E-01,  1.67124872251063E+00)
-X( 4) = (  1.48119026139274E+00, -1.83775346428567E+00)
-
-X( 5) = (  5.52052370187630E-02,  2.73214076482575E-01)
-
-PATH NUMBER =       857
-
-ARCLEN =  1.31837447536953E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96928791400108E-01
-
-X( 1) = ( -1.33450944900716E-01,  1.34033676332738E-02)
-X( 2) = (  8.19586334659036E-01,  5.42283187308316E-04)
-X( 3) = ( -2.75456161699962E-02,  3.96051567278040E-01)
-X( 4) = (  7.45842954091079E-01, -5.02359196560483E-01)
-
-X( 5) = (  9.18600826544585E-02,  5.14969982602803E-01)
-
-PATH NUMBER =       858
-
-ARCLEN =  1.29205352443993E+00
-NFE =  309
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99568598407246E-01
-
-X( 1) = ( -4.99664796781950E-01,  8.39989173205169E-01)
-X( 2) = (  3.89873102832343E-01, -1.48310146281913E-01)
-X( 3) = (  9.15797566025201E-01,  5.43430315749261E-01)
-X( 4) = (  9.04776243299385E-01, -8.32283108927016E-01)
-
-X( 5) = ( -5.76254883573078E-02,  3.45999721587519E-01)
-
-PATH NUMBER =       859
-
-ARCLEN =  1.14647753966043E+00
-NFE =   90
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.17255102010881E-13
-
-X( 1) = ( -2.55895886850902E+11,  1.45487011349271E+11)
-X( 2) = (  4.97194211715162E-01, -3.01051012932426E-01)
-X( 3) = (  1.08813976425987E+11,  4.31964258027812E+11)
-X( 4) = (  2.88643037898401E+11, -1.51446387258406E+11)
-
-X( 5) = (  3.25254309162942E-13,  1.16506852993262E-12)
-
-PATH NUMBER =       860
-
-ARCLEN =  1.57368886068546E+00
-NFE =  201
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.55291418457335E-10
-
-X( 1) = ( -1.84797102231353E+09,  5.91399904722434E+09)
-X( 2) = (  4.98017076429481E-01, -2.86644480710648E-01)
-X( 3) = (  3.39189358212053E+09,  3.49341143175706E+09)
-X( 4) = (  2.41836089481505E+09, -5.57374630171188E+09)
-
-X( 5) = ( -1.22502954503535E-11,  7.35097719457498E-11)
-
-PATH NUMBER =       861
-
-ARCLEN =  1.49792323708588E+00
-NFE =  287
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.61133938631591E-07
-
-X( 1) = (  6.40553808170825E+05,  2.66373806652908E+05)
-X( 2) = ( -1.53671568650715E-01,  2.41221666111154E-03)
-X( 3) = (  2.36608594698047E+05, -1.18862034349688E+06)
-X( 4) = (  9.51529836524272E-01,  2.06334444478845E-04)
-
-X( 5) = ( -2.84980374753437E-07, -3.95344404271200E-07)
-
-PATH NUMBER =       862
-
-ARCLEN =  1.53750570617695E+00
-NFE =  460
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99199500442803E-01
-
-X( 1) = ( -3.49643875258698E-01,  2.04893532993516E-01)
-X( 2) = (  7.52954441695168E-01,  1.53190324182842E-01)
-X( 3) = ( -1.65036803367716E-01,  1.07554713197541E+00)
-X( 4) = (  5.77012227851706E-01, -5.35992731739274E-01)
-
-X( 5) = (  6.61103670321724E-02,  2.81168376286628E-01)
-
-PATH NUMBER =       863
-
-ARCLEN =  1.71730090275265E+00
-NFE =  194
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.94292506848909E-12
-
-X( 1) = ( -8.35356012521305E+09, -2.80113185962214E+10)
-X( 2) = (  5.09105303374881E-01, -3.10105388310960E-01)
-X( 3) = ( -3.33744017677569E+10, -9.96722845085131E+09)
-X( 4) = (  3.49594690151564E+10,  3.17742361794144E+09)
-
-X( 5) = (  7.84366790810599E-12, -6.02895256504934E-12)
-
-PATH NUMBER =       864
-
-ARCLEN =  2.09509195308545E+00
-NFE =  357
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99943195506684E-01
-
-X( 1) = ( -8.44068963587088E-01,  1.44654809910298E-01)
-X( 2) = (  5.17729525172540E-01,  5.64123288756081E-02)
-X( 3) = (  3.61052083868321E-01,  3.51583654458099E-01)
-X( 4) = (  1.64401503918580E+00, -1.95852306229019E-01)
-
-X( 5) = (  2.79050769176092E-01,  4.42380931506117E-01)
-
-PATH NUMBER =       865
-
-ARCLEN =  3.02904168564690E+00
-NFE =  212
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.67189681046201E-07
-
-X( 1) = (  6.58670416477559E-01,  4.50852443516086E-03)
-X( 2) = ( -2.35372106205419E+00,  4.92570353525147E-01)
-X( 3) = ( -5.52348014658184E+06, -7.30032722321487E+06)
-X( 4) = (  2.31658076289810E+06,  1.09544344115600E+07)
-
-X( 5) = (  1.41481266090454E-08, -6.94527399037288E-08)
-
-PATH NUMBER =       866
-
-ARCLEN =  1.88160733087003E+00
-NFE =  239
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.94738618806132E-09
-
-X( 1) = (  3.43536879516023E+08, -2.57758320504578E+07)
-X( 2) = (  4.75733128136826E-01, -2.97340445341389E-01)
-X( 3) = (  8.76045602354142E+08, -2.86663835235001E+08)
-X( 4) = ( -1.09491167652857E+09, -6.96722890021069E+08)
-
-X( 5) = ( -6.54445188362843E-10,  4.26479517933592E-11)
-
-PATH NUMBER =       867
-
-ARCLEN =  1.82736554091999E+00
-NFE =  189
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.87859031855229E-08
-
-X( 1) = ( -2.66393914550949E-01, -2.45237816366991E-01)
-X( 2) = (  7.30433662498588E-01,  9.46970745211669E-02)
-X( 3) = (  5.76324926975952E+07,  1.43055038018046E+08)
-X( 4) = (  5.01876977271321E+07, -1.13941197694512E+08)
-
-X( 5) = ( -3.61299778127173E-10,  5.07490541408993E-09)
-
-PATH NUMBER =       868
-
-ARCLEN =  2.91758611501816E+00
-NFE =  416
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999917619621E-01
-
-X( 1) = (  6.30536661840965E-02,  1.88233220749001E-02)
-X( 2) = (  1.48710764585226E+01,  3.15652678891036E-01)
-X( 3) = (  1.08466424253221E+00,  3.43478783637421E-02)
-X( 4) = (  9.16016384708621E+00, -5.93903666057302E+00)
-
-X( 5) = ( -5.55615117094956E-02,  5.72953712598532E-02)
-
-PATH NUMBER =       869
-
-ARCLEN =  1.42870141763451E+00
-NFE =  182
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.89910848571301E-08
-
-X( 1) = ( -2.41541146316382E+06,  1.66126229368994E+06)
-X( 2) = ( -1.60151432942587E-01, -2.90920277567941E-02)
-X( 3) = (  6.38209341358618E+05,  5.08886703977909E+06)
-X( 4) = (  9.49669289400170E-01, -4.86835108345005E-03)
-
-X( 5) = (  8.39542904843677E-09,  9.57812926822752E-08)
-
-PATH NUMBER =       870
-
-ARCLEN =  2.33944484129962E+00
-NFE =  297
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.49410115159028E-07
-
-X( 1) = ( -1.15231626973196E+07,  7.35431395400893E+05)
-X( 2) = ( -4.90863535049027E-01,  8.61280416292006E-02)
-X( 3) = (  9.98000302699299E+06,  5.00844372255144E+06)
-X( 4) = (  7.44934421061391E-01, -1.04329331931407E-02)
-
-X( 5) = (  4.63044355815271E-10,  7.39106901696623E-08)
-
-PATH NUMBER =       871
-
-ARCLEN =  5.07956795972819E+00
-NFE =  402
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999923E-01
-
-X( 1) = ( -2.03487994280480E-01,  6.71912337553662E-02)
-X( 2) = ( -1.63076506936948E+02,  2.95339556547706E+02)
-X( 3) = ( -1.81662216058375E+01,  1.35650906909578E+00)
-X( 4) = (  8.87240908603823E-01,  2.49327647565677E-03)
-
-X( 5) = (  2.21934900411564E-03,  8.35978513376350E-04)
-
-PATH NUMBER =       872
-
-ARCLEN =  2.09735516395362E+00
-NFE =  259
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99992647860695E-01
-
-X( 1) = (  1.53653027116557E-01,  7.62443220281061E-01)
-X( 2) = (  4.36161214255164E-01, -9.83523819990131E-02)
-X( 3) = (  1.79819143724793E+00,  6.09770793982088E-01)
-X( 4) = (  1.15376585140892E+00, -2.39423415738503E+00)
-
-X( 5) = ( -1.56054688001365E-01,  2.74720554161996E-01)
-
-PATH NUMBER =       873
-
-ARCLEN =  3.38247416196506E+00
-NFE =  297
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.17449229069244E-07
-
-X( 1) = (  9.18694642912725E-02,  4.26143157437460E-03)
-X( 2) = ( -1.10311116509940E+06,  1.52347860836094E+06)
-X( 3) = (  2.84062180987291E+05,  9.32076879520668E+05)
-X( 4) = (  9.11711363560452E-01,  1.24091875950665E-03)
-
-X( 5) = (  2.75604253669609E-07,  2.95229899466959E-07)
-
-PATH NUMBER =       874
-
-ARCLEN =  3.72298672610473E+01
-NFE =  893
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991463305589E-01
-
-X( 1) = (  5.75789795770873E-01, -3.77557900045671E-01)
-X( 2) = (  5.37336450816693E-01, -1.76966833054423E+00)
-X( 3) = ( -1.56338518043472E-01,  2.15586267914821E-01)
-X( 4) = (  9.47471930811905E-01,  1.52194418331437E-01)
-
-X( 5) = ( -3.70437245201786E-01, -3.26786079013963E-01)
-
-PATH NUMBER =       875
-
-ARCLEN =  1.76658760323460E+00
-NFE =  355
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99029466777321E-01
-
-X( 1) = (  2.84593197673280E-01, -1.91060895644338E-01)
-X( 2) = (  4.09516650132031E-01, -2.73911451727448E-01)
-X( 3) = ( -5.76984392708725E-01,  6.16628772508730E-01)
-X( 4) = (  9.47459196101501E-01, -1.16204652447330E-01)
-
-X( 5) = (  4.87564731241299E-01,  6.96239119888673E-01)
-
-PATH NUMBER =       876
-
-ARCLEN =  1.94637064413288E+00
-NFE =  457
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999786195737E-01
-
-X( 1) = (  6.64857808938850E-01,  3.67916534047048E-02)
-X( 2) = ( -1.46738733101714E-01,  5.23929022094012E-02)
-X( 3) = ( -8.66239455105808E-01,  2.58054592026725E+00)
-X( 4) = (  1.07306539784142E+00, -5.41094307251782E-02)
-
-X( 5) = (  7.90701141666618E-02,  2.57979737360432E-01)
-
-PATH NUMBER =       877
-
-ARCLEN =  1.61798239356419E+00
-NFE =  321
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999637499213E-01
-
-X( 1) = (  1.06357007490555E+00,  2.13668214103879E+00)
-X( 2) = ( -6.67844368250348E-02, -9.86824402081223E-02)
-X( 3) = (  2.29832010541996E+00,  2.35819687389868E+00)
-X( 4) = (  9.60463463251827E-01, -2.61790883512211E-02)
-
-X( 5) = ( -9.19836490145907E-02,  9.72562844234757E-02)
-
-PATH NUMBER =       878
-
-ARCLEN =  3.99748889292212E+00
-NFE =  494
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999629299980E-01
-
-X( 1) = (  1.01435926719888E-01,  3.11519836378326E-02)
-X( 2) = (  1.31852092010576E+00,  3.74429386974724E-01)
-X( 3) = (  2.89689974759659E+00, -2.28648038452684E+00)
-X( 4) = (  1.98827822455751E+00, -1.27294677211664E+00)
-
-X( 5) = ( -2.34061109821142E-01, -1.33328835096039E-01)
-
-PATH NUMBER =       879
-
-ARCLEN =  1.85682116828045E+00
-NFE =  198
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.15349673314139E-08
-
-X( 1) = ( -1.33714158636487E+07,  6.45722758187567E+06)
-X( 2) = ( -3.50299970476356E-01, -7.02198790691486E-03)
-X( 3) = (  2.30359467687964E+07,  2.44352439292235E+07)
-X( 4) = (  7.41507504340656E-01, -1.67008462169080E-03)
-
-X( 5) = ( -7.50683531999872E-09,  1.78982473952980E-08)
-
-PATH NUMBER =       880
-
-ARCLEN =  2.20392904275212E+00
-NFE =  680
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997581505188E-01
-
-X( 1) = (  4.89256328681072E-01, -7.23212297132450E-01)
-X( 2) = (  4.09679211519072E-01,  9.90639809950542E-02)
-X( 3) = ( -2.47808290432230E+00,  1.40394142303196E+00)
-X( 4) = (  1.77049778786432E+00,  1.56733737328895E-01)
-
-X( 5) = (  2.48501272913500E-01,  8.29324847117722E-02)
-
-PATH NUMBER =       881
-
-ARCLEN =  2.13435107146595E+00
-NFE =  204
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.75055358881752E-09
-
-X( 1) = ( -1.13170294231099E-01,  2.55957345046094E-01)
-X( 2) = (  7.24925385393417E-01, -9.47311801161891E-02)
-X( 3) = (  1.40276422714622E+07, -2.36351722664120E+07)
-X( 4) = ( -2.13106989632268E+07,  4.83236329349506E+06)
-
-X( 5) = ( -2.14017095361376E-08, -1.91207627796329E-08)
-
-PATH NUMBER =       882
-
-ARCLEN =  2.49934450240065E+00
-NFE =  208
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.50746815737811E-08
-
-X( 1) = (  6.93844649636479E+06,  4.57908670777179E+06)
-X( 2) = (  1.10102053038644E-01, -1.81183088521309E-01)
-X( 3) = (  4.66706438769570E+06, -1.56942982487896E+07)
-X( 4) = (  9.34142334945068E-01, -1.23296015815277E-01)
-
-X( 5) = ( -2.47273299620442E-08, -2.95806800893221E-08)
-
-PATH NUMBER =       883
-
-ARCLEN =  3.80220513607612E+00
-NFE =  472
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96854950485299E-01
-
-X( 1) = (  4.30960094558120E-01, -5.12115080934174E-01)
-X( 2) = (  5.34377772071048E-01, -9.70756323025967E-01)
-X( 3) = ( -1.28583183285822E+00,  3.56125620659910E-01)
-X( 4) = (  6.28393427025452E-01,  7.14458611574319E-02)
-
-X( 5) = (  1.09907111793520E+00, -3.27013187755833E-01)
-
-PATH NUMBER =       884
-
-ARCLEN =  2.18470527082811E+00
-NFE =  480
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98996285540120E-01
-
-X( 1) = (  5.55429444174475E-01, -4.70937594919022E-02)
-X( 2) = (  4.07782214221461E-01, -7.07558962082004E-01)
-X( 3) = ( -5.49143120925923E-01,  6.39049945351360E-01)
-X( 4) = (  6.07006079863555E-01, -1.72362554805557E-01)
-
-X( 5) = ( -2.39135414782322E-01,  1.16028952274952E+00)
-
-PATH NUMBER =       885
-
-ARCLEN =  1.65841597007115E+00
-NFE =  280
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99981779807711E-01
-
-X( 1) = (  4.81409799619646E-01,  5.62423122140472E-01)
-X( 2) = (  9.29802738251878E-02, -5.44359507623115E-02)
-X( 3) = (  4.17685871039616E-01,  1.18562881415901E+00)
-X( 4) = (  9.61145825770341E-01, -4.95163922960460E-03)
-
-X( 5) = ( -1.43324964852194E-01,  3.51235252661586E-01)
-
-PATH NUMBER =       886
-
-ARCLEN =  2.05552646734676E+00
-NFE =  211
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.34047907458875E-07
-
-X( 1) = (  8.89886775896190E-01,  9.71118260943555E-01)
-X( 2) = ( -1.01965336535238E-01, -2.62120091736598E-01)
-X( 3) = (  1.30294465500675E+06,  5.76195426387742E+04)
-X( 4) = (  8.69784354189353E-01, -5.04669858775535E-02)
-
-X( 5) = ( -5.58984605691985E-07, -2.02216053846399E-09)
-
-PATH NUMBER =       887
-
-ARCLEN =  1.74795592982175E+00
-NFE =  182
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.28763513787997E-14
-
-X( 1) = ( -1.25083966100114E+11, -7.48862225316807E+11)
-X( 2) = (  9.80245102670298E+11, -1.14785386646514E+11)
-X( 3) = ( -1.19122017102664E+12, -1.07911850888660E+12)
-X( 4) = (  4.96688875658317E-01, -7.45158642791112E-03)
-
-X( 5) = (  2.96523683428543E-13, -3.73693968564598E-13)
-
-PATH NUMBER =       888
-
-ARCLEN =  2.28670175669952E+00
-NFE =  167
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.94940170254435E-08
-
-X( 1) = ( -1.37019945943056E+00, -1.30656760440589E-01)
-X( 2) = ( -2.27320794618219E+07, -3.74721349498693E+07)
-X( 3) = (  4.47901919481356E+06,  8.48046363546019E+07)
-X( 4) = (  6.32023962158899E-01,  2.02927356972724E-04)
-
-X( 5) = ( -4.18784103315556E-09,  1.41559486790499E-08)
-
-PATH NUMBER =       889
-
-ARCLEN =  2.28698093982187E+00
-NFE =  186
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.21907762885989E-13
-
-X( 1) = ( -1.05718831559969E+11, -4.86744165493862E+10)
-X( 2) = ( -1.66870897854116E+11, -7.96686319326281E+09)
-X( 3) = (  9.72033984688976E+10,  2.75364052442616E+11)
-X( 4) = (  5.00018608818150E-01, -1.03190913773219E-04)
-
-X( 5) = (  1.93720405927515E-12,  2.97409135079779E-12)
-
-PATH NUMBER =       890
-
-ARCLEN =  6.41151653340510E+00
-NFE =  266
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.67123766673488E-06
-
-X( 1) = ( -2.16198410751470E+05,  1.17569104046048E+05)
-X( 2) = ( -7.47956441630187E+05,  1.45376603020031E+06)
-X( 3) = (  1.29182625193029E+00, -2.70710626537810E+00)
-X( 4) = ( -1.25699586258669E+00,  1.57415045370473E-01)
-
-X( 5) = (  3.99529152654007E-07,  2.07058163126882E-07)
-
-PATH NUMBER =       891
-
-ARCLEN =  2.67082119980612E+00
-NFE =  309
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99915245844934E-01
-
-X( 1) = (  5.19163014285333E-01,  2.60554070552797E-01)
-X( 2) = (  3.28238420752780E-01, -6.71037487867828E-01)
-X( 3) = ( -9.14903381378998E-02,  1.43095575243662E+00)
-X( 4) = (  9.93283248215353E-01, -6.57018135966247E-01)
-
-X( 5) = ( -1.01600612924745E-01,  4.33600743978856E-01)
-
-PATH NUMBER =       892
-
-ARCLEN =  4.41384051850669E+00
-NFE =  322
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96016443797032E-01
-
-X( 1) = (  5.62649401439583E-01, -1.59228746141640E-01)
-X( 2) = (  8.86670504993045E-01, -8.83290868335126E-01)
-X( 3) = ( -1.44724717612091E+00,  6.72828432045624E-02)
-X( 4) = (  4.00871328739912E-01, -1.34007059787520E-01)
-
-X( 5) = (  1.56413044352726E+00,  7.88334908852133E-01)
-
-PATH NUMBER =       893
-
-ARCLEN =  2.47867820023353E+00
-NFE =  411
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.88929893421020E-01
-
-X( 1) = (  6.49086648621433E-01, -4.53283788189413E-02)
-X( 2) = (  6.52115588230087E-01, -2.33539515311618E-01)
-X( 3) = ( -8.34374758875399E-01, -3.79621408809416E-03)
-X( 4) = (  2.30783604683278E-01,  7.00954463171532E-02)
-
-X( 5) = (  1.07020829609876E-01,  1.50135118556441E+00)
-
-PATH NUMBER =       894
-
-ARCLEN =  2.30937722142540E+00
-NFE =  383
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99981612331332E-01
-
-X( 1) = (  7.21746741970278E-01,  3.92856491565089E-01)
-X( 2) = (  1.37446158238817E-01, -8.16686253480522E-01)
-X( 3) = (  2.22038399924583E-01,  4.95751793769543E-01)
-X( 4) = (  7.09296524257917E-01,  3.33112445820196E-01)
-
-X( 5) = ( -5.20042571597705E-01,  1.63056178276026E-01)
-
-PATH NUMBER =       895
-
-ARCLEN =  1.40796857200641E+00
-NFE =  268
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99800483675967E-01
-
-X( 1) = (  3.34228641755623E-01,  4.61910146405855E-01)
-X( 2) = (  1.41027583738568E-01,  3.01469464554469E-01)
-X( 3) = ( -2.58138279924486E-01,  8.15223557954699E-01)
-X( 4) = (  9.81245048784546E-01,  7.64612687966844E-02)
-
-X( 5) = (  7.25431053431681E-02,  4.30622671849547E-01)
-
-PATH NUMBER =       896
-
-ARCLEN =  2.31775731308481E+00
-NFE =  218
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.25892485476888E-10
-
-X( 1) = ( -2.70435425886243E+07, -1.18895859388013E+09)
-X( 2) = (  4.48739768491532E-01,  1.85702753676766E-01)
-X( 3) = ( -2.57548066833393E+09, -2.89529655280700E+09)
-X( 4) = ( -2.13133424412563E+09,  1.59787856055067E+09)
-
-X( 5) = (  1.00202314761572E-10, -1.53376404621580E-10)
-
-PATH NUMBER =       897
-
-ARCLEN =  2.49519197604662E+00
-NFE =  230
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.88347844091570E-07
-
-X( 1) = ( -1.12354199403693E+06,  1.44435910992205E+05)
-X( 2) = ( -2.27422383340602E+00, -3.33979210515919E-01)
-X( 3) = ( -7.23391587047374E+05, -7.67449870283092E+05)
-X( 4) = (  6.30246830249800E-01, -2.49335336604591E-03)
-
-X( 5) = (  4.18205027131362E-07, -3.49952024899635E-08)
-
-PATH NUMBER =       898
-
-ARCLEN =  2.25558905915062E+00
-NFE =  328
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99708867921461E-01
-
-X( 1) = (  1.47460666979147E-02,  5.93042081560304E-02)
-X( 2) = (  8.47280859436876E-01, -7.46423665906971E-01)
-X( 3) = ( -1.15708937197178E+00,  6.90954937069815E-01)
-X( 4) = (  8.11947320937642E-01,  1.12893609761990E-01)
-
-X( 5) = (  2.73848086053725E-01,  5.35872849975629E-01)
-
-PATH NUMBER =       899
-
-ARCLEN =  7.58600739405174E+00
-NFE =  270
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.59304940712115E-07
-
-X( 1) = ( -1.46833828190343E+00, -2.21894509228315E-01)
-X( 2) = (  1.10377924052001E+06,  6.08557381413836E+05)
-X( 3) = (  1.68268302375610E+05,  7.22440738512580E+04)
-X( 4) = (  6.38811083043014E-01,  7.35865516096411E-03)
-
-X( 5) = ( -2.82451838914179E-07,  5.32339755293534E-07)
-
-PATH NUMBER =       900
-
-ARCLEN =  3.89356346896112E+00
-NFE =  259
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.93407529229808E-08
-
-X( 1) = (  6.47142114980308E-01, -2.81617954712390E-02)
-X( 2) = ( -1.80735657811460E+00,  1.72211710566898E-01)
-X( 3) = (  1.72710601515460E+07, -2.49022054493875E+07)
-X( 4) = ( -1.23220634270622E+07, -7.05657228398363E+06)
-
-X( 5) = ( -1.82524950620888E-08, -2.26465048027845E-08)
-
-PATH NUMBER =       901
-
-ARCLEN =  2.34234813480047E+00
-NFE =  284
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97792162279089E-01
-
-X( 1) = (  4.89432374296881E-01,  6.19056250714401E-02)
-X( 2) = (  1.19719462984538E+00, -6.15548478814253E-01)
-X( 3) = ( -1.43401968137509E+00, -1.48619256767340E-01)
-X( 4) = (  2.72429558626479E-01, -3.94399822827546E-01)
-
-X( 5) = (  4.77328016481375E-01,  8.53057369220946E-01)
-
-PATH NUMBER =       902
-
-ARCLEN =  1.46125835042532E+00
-NFE =  311
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94302973859296E-01
-
-X( 1) = (  6.19820850370758E-01,  3.12472006521613E-01)
-X( 2) = (  7.77058184777033E-01, -1.94013493653189E-01)
-X( 3) = ( -6.90669850888355E-01, -1.19840154808419E-01)
-X( 4) = (  9.30669656113686E-02, -2.49745508395167E-01)
-
-X( 5) = ( -1.55861421613368E-01,  7.68626866938778E-01)
-
-PATH NUMBER =       903
-
-ARCLEN =  2.20498872539061E+00
-NFE =  286
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999644E-01
-
-X( 1) = (  3.74647065273432E+00,  1.45777097000127E+01)
-X( 2) = (  4.65721247720197E-01, -2.92225780474808E-01)
-X( 3) = ( -1.31839461471930E-02,  3.21082067087988E-02)
-X( 4) = (  9.91729595908645E-01,  2.31844361160525E-02)
-
-X( 5) = ( -2.87748479851785E-02,  3.78256856583197E-02)
-
-PATH NUMBER =       904
-
-ARCLEN =  1.51503959102383E+00
-NFE =  242
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999977928490E-01
-
-X( 1) = ( -3.26158164722356E-01,  5.28372330218347E+00)
-X( 2) = (  3.51394698272238E-01, -1.89571135601257E-01)
-X( 3) = (  6.08883022409991E-01,  8.49318319823083E-01)
-X( 4) = (  1.16366419519369E+00, -6.68031907861993E-01)
-
-X( 5) = ( -3.46576079695501E-02,  1.06413226189646E-01)
-
-PATH NUMBER =       905
-
-ARCLEN =  1.88104680891437E+00
-NFE =  327
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999980E-01
-
-X( 1) = (  6.70140458410512E+00,  1.16499903793264E+02)
-X( 2) = ( -4.37614149360165E-01, -9.34062603513663E-02)
-X( 3) = ( -3.40425422088324E+00,  6.72607485117547E+01)
-X( 4) = (  8.54159532321844E-01, -2.44366434604994E-02)
-
-X( 5) = ( -1.18750523060203E-03,  3.88843475298298E-03)
-
-PATH NUMBER =       906
-
-ARCLEN =  8.03615628294333E+00
-NFE =  450
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999931E-01
-
-X( 1) = ( -1.63440193958017E+00, -9.47533915009284E-02)
-X( 2) = (  6.71616075410408E+02, -1.36109366174174E+03)
-X( 3) = (  1.67147291032023E+02,  1.86640042416783E+02)
-X( 4) = (  6.33221112984038E-01, -3.13285513450176E-03)
-
-X( 5) = ( -5.02321084182204E-04, -1.29704324056238E-04)
-
-PATH NUMBER =       907
-
-ARCLEN =  2.21453390337765E+00
-NFE =  358
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99641458322617E-01
-
-X( 1) = ( -2.94833839514455E-01,  5.27007177690437E-02)
-X( 2) = (  8.02429149698855E-01, -3.43025331446311E-02)
-X( 3) = ( -1.28765655508813E+00,  1.00374549972641E+00)
-X( 4) = (  2.08584002537031E-01,  7.10322414150610E-01)
-
-X( 5) = (  1.38671517817152E-01,  2.82471527653676E-01)
-
-PATH NUMBER =       908
-
-ARCLEN =  5.57111497566768E+00
-NFE =  141
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.30206252630781E-13
-
-X( 1) = (  4.95205937846843E-01, -8.85813643535027E-03)
-X( 2) = (  3.03756933423935E+12, -4.01123908429710E+12)
-X( 3) = ( -4.85893711358579E+12,  3.49621084715079E+11)
-X( 4) = (  9.80513359163373E+11, -2.22702960080545E+12)
-
-X( 5) = (  4.11201752986354E-13, -8.45155109091555E-14)
-
-PATH NUMBER =       909
-
-ARCLEN =  5.05720976275307E+00
-NFE =  350
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.59909473961406E-06
-
-X( 1) = (  1.07156589556928E+00,  4.74883891415055E-01)
-X( 2) = (  1.08820384741456E+00, -3.38121280462806E-01)
-X( 3) = (  5.45254093116022E+05, -9.71915380285588E+05)
-X( 4) = ( -6.64110084405936E-02,  1.38531566624103E-03)
-
-X( 5) = ( -2.92446670025203E-07, -5.85187077896897E-07)
-
-PATH NUMBER =       910
-
-ARCLEN =  3.53621076519078E+00
-NFE =  749
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99272444790554E-01
-
-X( 1) = (  1.21205298500068E-01,  6.22575099846090E-02)
-X( 2) = (  9.91829764631676E-01, -3.82486134427778E-01)
-X( 3) = ( -1.27415608378302E+00, -4.84152374966458E-01)
-X( 4) = (  7.88362854384297E-01, -3.11254047664291E-01)
-
-X( 5) = (  7.44819403686181E-01,  2.35759852721571E-01)
-
-PATH NUMBER =       911
-
-ARCLEN =  1.56798204796981E+00
-NFE =  320
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98910750249792E-01
-
-X( 1) = (  6.16227258775107E-01,  5.28918407595604E-01)
-X( 2) = (  7.22573055433789E-01, -1.44061172243965E-01)
-X( 3) = ( -6.00471056650674E-01, -9.86407168822349E-02)
-X( 4) = ( -1.11135407747080E-01, -7.90280485607691E-01)
-
-X( 5) = ( -5.26756146754405E-02,  5.48683648805864E-01)
-
-PATH NUMBER =       912
-
-ARCLEN =  1.95434871629141E+00
-NFE =  246
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.17514303506865E-07
-
-X( 1) = (  5.57639005684973E+05,  9.65746218276262E+05)
-X( 2) = (  7.34953017230257E-01,  3.24036153535562E-02)
-X( 3) = ( -5.56452335548052E-02, -1.18441542605173E-01)
-X( 4) = (  3.20869333258969E+04, -5.10295373565666E+05)
-
-X( 5) = ( -4.86434689837709E-07,  5.21613274871388E-07)
-
-PATH NUMBER =       913
-
-ARCLEN =  1.45210477703473E+00
-NFE =  354
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999820814144E-01
-
-X( 1) = ( -1.57649484020140E+00,  4.21672062282903E+00)
-X( 2) = (  3.90792583007415E-01, -1.37837166439499E-01)
-X( 3) = (  6.74183106537057E-01,  8.01979349210953E-01)
-X( 4) = (  1.56121863134192E+00, -1.02090261485411E+00)
-
-X( 5) = ( -6.49341879654585E-03,  1.28910400157779E-01)
-
-PATH NUMBER =       914
-
-ARCLEN =  1.70134354708079E+00
-NFE =  370
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999975284406E-01
-
-X( 1) = ( -4.23963148654717E+00,  3.28673032574117E+00)
-X( 2) = (  2.94981716441843E-01,  1.28118054221310E-01)
-X( 3) = (  4.58617753706727E-01,  7.14673328026164E-01)
-X( 4) = (  9.84030717215387E-01,  2.57497379802064E-01)
-
-X( 5) = (  4.26658291862080E-02,  1.06811677228436E-01)
-
-PATH NUMBER =       915
-
-ARCLEN =  1.48199271174167E+00
-NFE =  178
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.56755616068029E-10
-
-X( 1) = ( -1.10106726314639E+10,  1.70832822793751E+09)
-X( 2) = (  5.74983068092088E-01, -4.33005672794789E-01)
-X( 3) = ( -6.90802268150573E+09,  3.66130712848068E+09)
-X( 4) = (  1.62807169147215E+09, -2.65581590042000E+09)
-
-X( 5) = (  3.15789431821860E-11,  1.78734726129746E-11)
-
-PATH NUMBER =       916
-
-ARCLEN =  2.08586401455444E+00
-NFE =  309
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.52008944848235E-09
-
-X( 1) = ( -5.42157387726077E+06,  1.44270775043960E+07)
-X( 2) = (  8.24670724471905E-01,  1.02104791928078E-01)
-X( 3) = ( -2.72148599935559E+06,  2.02256607425263E+07)
-X( 4) = ( -8.29431542402204E-02, -1.24479354321678E-01)
-
-X( 5) = (  5.04404405342242E-10,  2.03762795067289E-08)
-
-PATH NUMBER =       917
-
-ARCLEN =  6.47770741789084E+00
-NFE =  218
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.98439964186899E-12
-
-X( 1) = (  5.20739061121205E-01,  2.58154843813237E-04)
-X( 2) = (  1.18775225155364E+11,  4.23545473406220E+10)
-X( 3) = (  4.45964605381271E+10, -1.85912083790415E+11)
-X( 4) = (  8.98118216843709E+10, -4.81104707216456E+10)
-
-X( 5) = ( -2.27042538415712E-12, -5.02145617838415E-12)
-
-PATH NUMBER =       918
-
-ARCLEN =  3.32688540913906E+00
-NFE =  488
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99452475618178E-01
-
-X( 1) = (  5.87931297583764E-01,  1.87355265715170E-01)
-X( 2) = (  6.99998399172404E-01, -9.17375382921609E-01)
-X( 3) = ( -1.01284565168282E+00,  8.27115161230273E-01)
-X( 4) = (  5.68590210637159E-01, -6.55763322604371E-01)
-
-X( 5) = (  4.34881223993218E-02,  6.33375582519381E-01)
-
-PATH NUMBER =       919
-
-ARCLEN =  1.35140244857760E+00
-NFE =  239
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96633822732609E-01
-
-X( 1) = ( -2.43666271381250E-02,  1.78129929202787E-01)
-X( 2) = (  1.06330502393898E+00, -5.35838545028116E-02)
-X( 3) = ( -3.38466121676771E-01,  4.90391096792810E-03)
-X( 4) = (  5.87653538390757E-01, -8.02702807704065E-01)
-
-X( 5) = (  1.20222156450636E-01,  5.24268043403773E-01)
-
-PATH NUMBER =       920
-
-ARCLEN =  1.33143342109222E+00
-NFE =  345
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97099684716566E-01
-
-X( 1) = (  4.60529327976777E-02,  4.30912779450687E-01)
-X( 2) = (  9.19587732152416E-01, -3.63856512551890E-02)
-X( 3) = ( -2.31005137921002E-01, -6.77388169638867E-02)
-X( 4) = (  4.49986921594213E-01, -5.76658942235173E-01)
-
-X( 5) = (  8.06602008029418E-03,  5.24801094921878E-01)
-
-PATH NUMBER =       921
-
-ARCLEN =  1.55685848712158E+00
-NFE =  475
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997148954340E-01
-
-X( 1) = ( -1.04388781872734E+00,  2.63774489025249E+00)
-X( 2) = (  5.09016258992591E-01,  4.55886547523544E-01)
-X( 3) = (  4.15778529548305E-01, -2.56048945294005E-01)
-X( 4) = (  1.27126555369489E+00, -1.17624636430266E+00)
-
-X( 5) = (  2.44835324527172E-02,  2.03422114671492E-01)
-
-PATH NUMBER =       922
-
-ARCLEN =  1.94710061580012E+00
-NFE =  309
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999732E-01
-
-X( 1) = ( -5.51062460733682E+01,  3.62310322840731E+01)
-X( 2) = ( -3.79533681994974E-01,  7.88956406283543E-03)
-X( 3) = (  8.73117866794310E-01,  4.75852044872125E-04)
-X( 4) = (  1.85486086052556E+01, -2.47874746815347E+01)
-
-X( 5) = (  6.77575114693514E-03,  7.42809079593756E-03)
-
-PATH NUMBER =       923
-
-ARCLEN =  1.11468995333123E+00
-NFE =  109
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.29474117671100E-14
-
-X( 1) = (  1.24306735795115E+12, -2.29508512022595E+12)
-X( 2) = (  4.80288079450380E-01, -2.99126365115438E-01)
-X( 3) = ( -1.35364624605064E+12, -1.96616643539779E+12)
-X( 4) = ( -4.17224910360557E+11,  1.74782374383866E+12)
-
-X( 5) = (  1.55122225828364E-14, -1.53974977299548E-13)
-
-PATH NUMBER =       924
-
-ARCLEN =  1.27620352095503E+00
-NFE =  144
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.81778459685751E-12
-
-X( 1) = (  1.45627841204162E+11,  4.33725593921240E+10)
-X( 2) = (  5.00248021766969E-01, -2.83682678065958E-01)
-X( 3) = (  9.55013853551761E+10, -6.49372300385549E+10)
-X( 4) = ( -8.04006207593396E+10,  9.75688006312693E+09)
-
-X( 5) = ( -2.63881334860473E-12, -5.93874504694475E-13)
-
-PATH NUMBER =       925
-
-ARCLEN =  1.63622423851969E+00
-NFE =  222
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.78178618312890E-09
-
-X( 1) = ( -2.01343263879792E+07, -1.28274930962663E+07)
-X( 2) = (  8.39270198151747E-01,  1.09889250804521E-01)
-X( 3) = ( -5.21543765743796E+07,  2.09002528477534E+07)
-X( 4) = ( -5.65282761318142E-02, -1.41095255221608E-01)
-
-X( 5) = (  9.11630394022605E-09,  2.40905209528738E-09)
-
-PATH NUMBER =       926
-
-ARCLEN =  3.52344033430127E+00
-NFE =  559
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999892E-01
-
-X( 1) = ( -2.52583572938402E+01,  1.14847912875358E+02)
-X( 2) = (  4.81233264638649E-01, -1.11316394365062E-01)
-X( 3) = (  6.63586801015602E-01,  1.01744178358704E+00)
-X( 4) = (  7.83588350666187E+01, -4.90799314292121E+01)
-
-X( 5) = (  8.05313512724691E-04,  7.47029049341575E-03)
-
-PATH NUMBER =       927
-
-ARCLEN =  2.50537523536717E+00
-NFE =  267
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.16943458036012E-06
-
-X( 1) = ( -4.39926434595266E+05, -8.15187479574556E+04)
-X( 2) = (  6.87912311287874E-01, -6.77915668787034E-02)
-X( 3) = (  5.07754936094481E-02,  2.60111515681135E-02)
-X( 4) = (  7.73200386285653E+05,  2.50090759547035E+05)
-
-X( 5) = (  1.18552727247347E-06, -5.96745506772369E-07)
-
-PATH NUMBER =       928
-
-ARCLEN =  1.31348719155669E+00
-NFE =  321
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98711924657122E-01
-
-X( 1) = ( -3.77562682306262E-02,  1.22388512759912E-02)
-X( 2) = (  9.93706389800712E-01,  3.96435869907870E-02)
-X( 3) = ( -4.31044656351744E-01,  6.71459763398529E-01)
-X( 4) = (  5.48688180644665E-01, -1.23299634285615E+00)
-
-X( 5) = (  1.16978872422218E-01,  3.28910078488214E-01)
-
-PATH NUMBER =       929
-
-ARCLEN =  1.28084262134718E+00
-NFE =  247
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95596320638612E-01
-
-X( 1) = ( -2.16710941746062E-01,  2.56737023200261E-01)
-X( 2) = (  7.87355311320936E-01, -4.91325950453192E-03)
-X( 3) = ( -1.49633314421775E-01,  3.01607467951521E-02)
-X( 4) = (  6.98402941995351E-01, -5.55060218033623E-01)
-
-X( 5) = (  1.60043583239822E-01,  5.21888554850384E-01)
-
-PATH NUMBER =       930
-
-ARCLEN =  1.70221779737943E+00
-NFE =  340
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996351262067E-01
-
-X( 1) = ( -2.72219213985372E+00,  9.40954477893191E-01)
-X( 2) = (  4.26059416946553E-01, -8.67164468608484E-02)
-X( 3) = (  6.94692495396649E-01,  7.21554446720155E-01)
-X( 4) = (  2.65997161494295E+00, -6.14553530168292E-01)
-
-X( 5) = (  1.39803933687985E-01,  1.67751225511874E-01)
-
-PATH NUMBER =       931
-
-ARCLEN =  1.24141393689576E+00
-NFE =  139
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.41288350344371E-11
-
-X( 1) = (  6.44954394347191E+10, -7.02100069969927E+10)
-X( 2) = (  5.29711438427586E-01, -2.60034553506627E-01)
-X( 3) = ( -3.73329162920422E+10, -8.97215665269816E+10)
-X( 4) = ( -6.42518323496374E+10,  6.72472015482351E+10)
-
-X( 5) = ( -7.15073182958048E-13, -4.25908803667815E-12)
-
-PATH NUMBER =       932
-
-ARCLEN =  1.07452087001774E+00
-NFE =   98
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.69332849059261E-13
-
-X( 1) = ( -6.20852433370517E+11,  1.15951869468084E+11)
-X( 2) = (  5.09546296017248E-01, -2.74593637063313E-01)
-X( 3) = ( -1.23799206487194E+11,  6.66427504378546E+11)
-X( 4) = (  4.82370070211896E+11, -1.75745048605261E+11)
-
-X( 5) = (  4.13308249387276E-13,  4.65645480073745E-13)
-
-PATH NUMBER =       933
-
-ARCLEN =  1.33523588405191E+00
-NFE =  156
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.41887706060439E-13
-
-X( 1) = (  3.60853148687195E+11,  8.59221098348909E+11)
-X( 2) = (  4.95159573103430E-01, -2.93041697715243E-01)
-X( 3) = (  8.49969922695706E+11,  6.28884334828110E+10)
-X( 4) = ( -3.93198440290948E+11, -5.06975450687458E+11)
-
-X( 5) = ( -3.63404429161787E-13,  2.36222445684081E-13)
-
-PATH NUMBER =       934
-
-ARCLEN =  2.03551444249403E+00
-NFE =  272
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.75946029025243E-06
-
-X( 1) = (  2.97460549941120E+04,  1.21803656608943E+05)
-X( 2) = (  5.06149719248618E-01,  9.68849978777879E-02)
-X( 3) = (  2.95003279914112E+04,  5.82570805044416E+04)
-X( 4) = (  5.64840602249114E-01, -1.07685878799497E+00)
-
-X( 5) = ( -2.18453069575250E-06,  3.14053325635422E-06)
-
-PATH NUMBER =       935
-
-ARCLEN =  1.73056323212693E+00
-NFE =  190
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.85430987888031E-10
-
-X( 1) = ( -3.44561153217433E+07, -1.56646780480027E+08)
-X( 2) = (  4.97714264932565E-01, -2.82139935234482E-01)
-X( 3) = ( -1.36273973077823E+08, -1.50918130289638E+08)
-X( 4) = (  3.77128555864945E+08,  2.65136799437356E+08)
-
-X( 5) = (  5.70102524894258E-10, -1.28982524118769E-09)
-
-PATH NUMBER =       936
-
-ARCLEN =  2.13510274521754E+00
-NFE =  305
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.35590730563732E-08
-
-X( 1) = ( -1.65548718000840E+08, -1.42555277710965E+09)
-X( 2) = (  6.60391246755063E-01,  3.25297213049946E-01)
-X( 3) = ( -6.85032633663865E+08, -4.35335408369039E+08)
-X( 4) = ( -1.34723445877346E+08,  2.35134242327977E+09)
-
-X( 5) = (  8.05358298496331E-11, -3.36151648725781E-10)
-
-PATH NUMBER =       937
-
-ARCLEN =  1.91221672253623E+00
-NFE =  238
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999914E-01
-
-X( 1) = ( -1.57369384293094E-02,  3.60234791927055E-02)
-X( 2) = (  1.10442219380104E+00, -1.41009851380305E-02)
-X( 3) = (  2.21804694383669E+01,  1.09664042581524E+02)
-X( 4) = (  2.46665195338974E+01, -1.54174397836234E+02)
-
-X( 5) = (  1.47103932303450E-03,  5.17284325071370E-03)
-
-PATH NUMBER =       938
-
-ARCLEN =  1.30887761890099E+00
-NFE =  342
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97588208523866E-01
-
-X( 1) = ( -1.13266872348240E-01,  1.85402893811635E-01)
-X( 2) = (  9.75909785052215E-01,  1.72630275712265E-01)
-X( 3) = ( -1.35111574148791E-01,  3.32329388799648E-01)
-X( 4) = (  8.61860092319644E-01, -6.88229560857862E-01)
-
-X( 5) = (  9.00949481688776E-02,  4.21719230446813E-01)
-
-PATH NUMBER =       939
-
-ARCLEN =  1.40918473425661E+00
-NFE =  259
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98109358374552E-01
-
-X( 1) = ( -1.10333883959039E-01,  1.75225947546640E-01)
-X( 2) = (  9.80005083715849E-01,  1.60700316791556E-01)
-X( 3) = ( -1.25961363451882E-01,  3.06563149850267E-01)
-X( 4) = (  8.55994024130468E-01, -6.79154061257090E-01)
-
-X( 5) = (  8.96143637394644E-02,  4.33902350886728E-01)
-
-PATH NUMBER =       940
-
-ARCLEN =  1.36005566617493E+00
-NFE =  277
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96541794368690E-01
-
-X( 1) = ( -1.40862389599026E-01,  4.41602422329884E-01)
-X( 2) = (  7.89696279235779E-01,  5.17522117461053E-01)
-X( 3) = (  4.76452109193335E-01,  4.43028618152082E-01)
-X( 4) = (  6.04150727030653E-01, -5.03489194672412E-01)
-
-X( 5) = ( -2.34880758079275E-02,  3.34216046857662E-01)
-
-PATH NUMBER =       941
-
-ARCLEN =  1.09345235471739E+00
-NFE =  139
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.72878905279736E-13
-
-X( 1) = ( -2.03346131310910E+11, -1.87466412937500E+11)
-X( 2) = (  4.96079831433361E-01, -2.88225227521119E-01)
-X( 3) = ( -3.01276066865292E+11,  1.72318441099521E+11)
-X( 4) = (  2.03881757485775E+11,  1.61314092751494E+11)
-
-X( 5) = (  1.36893423571642E-12, -3.64295724662733E-14)
-
-PATH NUMBER =       942
-
-ARCLEN =  2.11571879515089E+00
-NFE =  198
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.42051670319426E-09
-
-X( 1) = ( -6.04731934184588E-01, -1.86829964326307E-02)
-X( 2) = (  1.87345465240571E+08, -5.94931339081568E+07)
-X( 3) = ( -5.37452148096073E+07, -2.79846364244244E+08)
-X( 4) = (  6.27761797561573E-01, -7.25381364138310E-03)
-
-X( 5) = ( -1.20976781776928E-09, -2.90587742085048E-09)
-
-PATH NUMBER =       943
-
-ARCLEN =  1.58998018426904E+00
-NFE =  247
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.48184018780493E-07
-
-X( 1) = (  5.80433040362642E+05,  3.29558529209273E+05)
-X( 2) = (  4.65295584955318E-01,  1.12173291846306E-01)
-X( 3) = (  1.32616747517039E+06, -6.71317818710431E+05)
-X( 4) = (  6.08300466982837E-01, -9.78878923641115E-01)
-
-X( 5) = ( -3.33636216242868E-07, -1.13573656501632E-07)
-
-PATH NUMBER =       944
-
-ARCLEN =  2.70688657827302E+00
-NFE =  216
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.04141426923083E-05
-
-X( 1) = ( -1.05938133159681E+05,  1.53741590827064E+05)
-X( 2) = (  4.86650668600310E-01, -1.15198647613195E-01)
-X( 3) = (  5.03109865833127E-01,  9.05399114686800E-01)
-X( 4) = (  2.81521631968194E+05, -4.33784104038484E+05)
-
-X( 5) = (  2.04204668241090E-06,  1.25513091604648E-06)
-
-PATH NUMBER =       945
-
-ARCLEN =  1.63696008744372E+00
-NFE =  159
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.37489078833090E-10
-
-X( 1) = ( -8.32985394880501E+08,  3.14696397185648E+08)
-X( 2) = (  5.13268878303743E-01, -2.44470076785365E-01)
-X( 3) = (  1.40847829588764E+09,  2.75251757409540E+09)
-X( 4) = ( -1.27942694693381E+09, -3.67091234575420E+09)
-
-X( 5) = (  9.82829388620349E-12,  1.60474793772358E-10)
-
-PATH NUMBER =       946
-
-ARCLEN =  4.47297965952531E+00
-NFE =  390
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997156061338E-01
-
-X( 1) = (  1.55593807233074E+00, -3.30189962413013E-01)
-X( 2) = (  1.36904004271672E+00, -1.38227246508246E-04)
-X( 3) = (  3.86642874950224E-02,  7.06346013290870E-03)
-X( 4) = ( -3.80349533837763E-01,  2.59241621348513E+00)
-
-X( 5) = ( -2.42490678582477E-01,  9.13820860909771E-03)
-
-PATH NUMBER =       947
-
-ARCLEN =  2.69996312502047E+00
-NFE =  392
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998789644310E-01
-
-X( 1) = (  4.00731447539207E-03,  1.41680052998240E-02)
-X( 2) = (  7.10791479393797E-01, -7.75808640709480E-03)
-X( 3) = ( -2.99064207015738E+00, -1.12526634314385E+00)
-X( 4) = (  3.40899251788255E+00,  2.56983507093329E+00)
-
-X( 5) = (  1.93418274991132E-01, -1.34268557608920E-01)
-
-PATH NUMBER =       948
-
-ARCLEN =  1.24333092427691E+00
-NFE =  332
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98710906781663E-01
-
-X( 1) = ( -1.34662268262980E-02,  4.81860353024137E-02)
-X( 2) = (  5.80849440303922E-01,  2.46146854992479E-01)
-X( 3) = ( -8.17389804838032E-01,  6.45321014244259E-01)
-X( 4) = (  1.01255104909566E+00, -6.46971585797924E-02)
-
-X( 5) = (  2.33149650829307E-01,  3.22996355110545E-01)
-
-PATH NUMBER =       949
-
-ARCLEN =  1.90022220131224E+00
-NFE =  200
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.40189342936333E-07
-
-X( 1) = ( -1.37936574351208E+06, -1.14503906793739E+06)
-X( 2) = ( -7.62745695741987E-03,  2.32248758349439E-01)
-X( 3) = (  2.60434394816361E+05, -1.53879641401501E+06)
-X( 4) = (  8.92053999001285E-01, -9.82199405801961E-02)
-
-X( 5) = (  1.71759266821868E-07, -2.27416494817092E-07)
-
-PATH NUMBER =       950
-
-ARCLEN =  2.19577740871313E+00
-NFE =  423
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997726554996E-01
-
-X( 1) = (  6.72057574921781E-01,  3.97300151624844E-01)
-X( 2) = (  9.99254636540261E-02,  7.02388031178704E-02)
-X( 3) = ( -1.08332759468611E+00,  1.19336457904452E+00)
-X( 4) = (  9.57164884805187E-01, -3.39263955390026E-02)
-
-X( 5) = (  1.53187720202628E-01,  3.57325506787970E-01)
-
-PATH NUMBER =       951
-
-ARCLEN =  1.36581549396305E+00
-NFE =  263
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.95648121981076E-07
-
-X( 1) = ( -4.63987280345308E+06, -1.71691686992435E+06)
-X( 2) = ( -2.74347453194675E-01, -2.66500396109669E-02)
-X( 3) = ( -6.39944665355343E+06,  5.82770120834130E+06)
-X( 4) = (  9.24068438274929E-01, -3.00843486502037E-03)
-
-X( 5) = (  4.92576196639224E-08,  2.86285722987645E-08)
-
-PATH NUMBER =       952
-
-ARCLEN =  1.46507162768442E+00
-NFE =  237
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.74112479458823E-07
-
-X( 1) = ( -2.27736544989384E+04,  9.43655322784420E+05)
-X( 2) = (  5.54007150671874E-02, -1.37629367765789E-01)
-X( 3) = (  1.75199315330659E+06,  9.62444500651029E+05)
-X( 4) = (  9.51914371956579E-01,  2.81237040091052E-02)
-
-X( 5) = ( -2.03621495565730E-07,  1.65410105617484E-07)
-
-PATH NUMBER =       953
-
-ARCLEN =  1.84121020959989E+00
-NFE =  189
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.85393447418938E-10
-
-X( 1) = (  3.37109627226246E+08, -3.39369675881411E+09)
-X( 2) = (  5.00114115939845E-01, -2.26973728831643E-01)
-X( 3) = ( -2.93134557498631E+09, -3.72985167553760E+09)
-X( 4) = ( -2.41191045350978E+09,  6.66609539021258E+09)
-
-X( 5) = (  1.51186933252615E-11, -9.89187981742870E-11)
-
-PATH NUMBER =       954
-
-ARCLEN =  1.48653542042613E+00
-NFE =  137
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.48865822918141E-11
-
-X( 1) = ( -4.01774033821805E+09,  1.36219630022532E+10)
-X( 2) = (  5.12907254042677E-01, -2.10375717596527E-01)
-X( 3) = (  2.43518211419067E+10, -1.44328954379650E+10)
-X( 4) = ( -1.72545902234755E+10,  9.66085425275392E+09)
-
-X( 5) = ( -2.21212339895568E-11,  2.28244343997847E-12)
-
-PATH NUMBER =       955
-
-ARCLEN =  2.78974350539517E+00
-NFE =  369
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96429752941168E-01
-
-X( 1) = (  7.02922491586019E-02, -1.83793781674547E-02)
-X( 2) = (  1.41086293258176E+00,  1.40713504193383E-01)
-X( 3) = ( -1.17373340235254E+00,  3.29677479844550E-01)
-X( 4) = (  1.25523217894274E+00, -2.87977293292243E-01)
-
-X( 5) = (  2.33547665096516E-01,  3.60784939446477E-01)
-
-PATH NUMBER =       956
-
-ARCLEN =  1.08742070153151E+00
-NFE =  379
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95502992551318E-01
-
-X( 1) = (  6.63213122742847E-03, -1.43920122468017E-01)
-X( 2) = (  5.98645944722658E-01, -9.47997638217837E-02)
-X( 3) = ( -7.90699570281490E-01,  6.97881035498742E-01)
-X( 4) = (  1.06949289632364E+00, -1.50260746285433E-01)
-
-X( 5) = (  3.17562391795673E-01,  3.78729034411845E-01)
-
-PATH NUMBER =       957
-
-ARCLEN =  2.56337647020668E+00
-NFE =  345
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99986747343461E-01
-
-X( 1) = (  9.99379858018811E-01,  4.31776495430165E-02)
-X( 2) = (  1.96379579352310E+00,  1.91110527611458E+00)
-X( 3) = ( -3.72091173415323E-03,  1.46191535792060E-02)
-X( 4) = (  1.36583358001527E+00, -1.95200010469718E+00)
-
-X( 5) = (  1.92316104847202E-02,  2.91880295774557E-01)
-
-PATH NUMBER =       958
-
-ARCLEN =  5.24532597080604E+00
-NFE =  531
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998380867614E-01
-
-X( 1) = (  1.42604457094364E+00,  2.05688498707352E+00)
-X( 2) = ( -9.18312021531914E-01,  2.33314595997308E-01)
-X( 3) = (  5.99875372373117E-01,  3.55671973791311E-01)
-X( 4) = (  6.69960528789604E-01, -1.20980779811760E-01)
-
-X( 5) = ( -2.12747424106769E-01,  2.37283812790731E-01)
-
-PATH NUMBER =       959
-
-ARCLEN =  1.48967832054339E+00
-NFE =  196
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.67756644007779E-08
-
-X( 1) = (  4.82451570018636E+05, -2.70972251014331E+06)
-X( 2) = ( -1.63304053144731E-01,  2.52992245115579E-02)
-X( 3) = ( -9.48978966778204E+05, -2.92536545285334E+06)
-X( 4) = (  9.52431748330480E-01,  4.04869023298237E-03)
-
-X( 5) = (  3.74456859228867E-08, -1.19458803688594E-07)
-
-PATH NUMBER =       960
-
-ARCLEN =  2.12984472347124E+00
-NFE =  223
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.71716386787595E-07
-
-X( 1) = ( -1.95925109208917E+00, -1.07734695694596E+00)
-X( 2) = ( -1.83434565123649E+06,  2.66333202076342E+06)
-X( 3) = ( -2.27221140515005E+05,  4.11236332032153E+05)
-X( 4) = (  6.42557890055703E-01,  4.30055853930512E-03)
-
-X( 5) = (  2.17368903600946E-07,  8.89846961539108E-08)
-
-PATH NUMBER =       961
-
-ARCLEN =  1.49620724073638E+00
-NFE =  354
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97599756952065E-01
-
-X( 1) = (  3.83976995576991E-02, -6.61252022553595E-02)
-X( 2) = (  3.70974438342131E-01, -4.91092695566155E-03)
-X( 3) = ( -3.99132479413440E-01,  6.83690264874601E-01)
-X( 4) = (  1.02061937990063E+00, -1.47163650556419E-02)
-
-X( 5) = (  2.93312692156075E-01,  5.01466988716352E-01)
-
-PATH NUMBER =       962
-
-ARCLEN =  3.24127749025084E+00
-NFE =  315
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87045043272744E-01
-
-X( 1) = ( -4.44692551343742E-01, -5.02100612719716E-01)
-X( 2) = ( -1.60628265721565E-01, -1.05478113083134E+00)
-X( 3) = (  1.00297204559606E-01,  1.02885654037671E+00)
-X( 4) = (  8.44117978970377E-01,  5.93784308299238E-03)
-
-X( 5) = (  1.13922762095705E+00,  6.79629863506956E-01)
-
-PATH NUMBER =       963
-
-ARCLEN =  2.49316486085515E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999939E-01
-
-X( 1) = (  1.29590225865066E+02, -6.01035299577771E+01)
-X( 2) = ( -8.36646485033953E-02, -7.82031564685451E-02)
-X( 3) = ( -1.24880461853166E+02, -4.54482113673792E+01)
-X( 4) = (  9.94748933625217E-01, -1.99697778570652E-02)
-
-X( 5) = (  1.06024022487330E-03, -4.72786700218459E-03)
-
-PATH NUMBER =       964
-
-ARCLEN =  3.71734459316038E+00
-NFE =  295
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.90557905431493E-06
-
-X( 1) = (  8.48509232217920E-01, -8.42500459172482E-02)
-X( 2) = ( -2.81023927051973E-02, -3.19765514895233E-01)
-X( 3) = ( -2.79982963157971E+05,  1.79108036029921E+05)
-X( 4) = (  9.08840718949670E-01,  7.82779012072248E-01)
-
-X( 5) = (  1.78913600134404E-06,  1.26897828714337E-06)
-
-PATH NUMBER =       965
-
-ARCLEN =  1.31196713749462E+00
-NFE =  274
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97464252838562E-01
-
-X( 1) = (  5.11267539008260E-02, -1.43957530026536E-01)
-X( 2) = (  4.81387257056112E-01, -1.20330771517364E-01)
-X( 3) = ( -1.02984408751388E+00,  7.01239641221775E-01)
-X( 4) = (  9.38797143907653E-01,  5.15857953730778E-02)
-
-X( 5) = (  3.44387144850291E-01,  3.29628103812309E-01)
-
-PATH NUMBER =       966
-
-ARCLEN =  1.82967187493568E+00
-NFE =  435
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99814451664564E-01
-
-X( 1) = (  4.04553343520616E-01,  1.00006372887176E-01)
-X( 2) = (  3.90759762010515E-01, -1.55582008748267E-01)
-X( 3) = ( -8.41489444828510E-01,  4.39232124411793E-01)
-X( 4) = (  9.91035624462868E-01,  2.01921292471540E-01)
-
-X( 5) = (  4.52440536699333E-01,  6.75969613491693E-01)
-
-PATH NUMBER =       967
-
-ARCLEN =  2.19378465711619E+00
-NFE =  295
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.87181953218689E-06
-
-X( 1) = ( -3.45838797070587E+05,  7.79540590999861E+04)
-X( 2) = ( -7.00019069085905E-01,  1.67321557692359E-01)
-X( 3) = ( -2.01390159890983E+05,  2.03827856973772E+04)
-X( 4) = (  8.26337066364091E-01,  2.64589321933726E-02)
-
-X( 5) = (  1.20348036651704E-06,  5.98105558894996E-07)
-
-PATH NUMBER =       968
-
-ARCLEN =  2.02879486237632E+00
-NFE =  254
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.60230162003239E-07
-
-X( 1) = (  2.34824769427379E+07,  2.32055333732210E+07)
-X( 2) = ( -4.55182397945609E+00, -4.31699389442361E+00)
-X( 3) = ( -4.63772223617280E+06,  3.03848518363168E+07)
-X( 4) = (  6.42762798560936E-01, -2.05364283717089E-03)
-
-X( 5) = ( -7.89128526477827E-09,  1.20449014606684E-08)
-
-PATH NUMBER =       969
-
-ARCLEN =  1.83177529895293E+00
-NFE =  196
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.34558322810573E-08
-
-X( 1) = (  1.82470209668055E+06, -1.06477544796603E+06)
-X( 2) = ( -9.61496507272151E-01, -2.52173746071569E-02)
-X( 3) = (  2.99806701827756E+05, -5.14725618361510E+06)
-X( 4) = (  7.37394818325145E-01,  4.25425606955875E-04)
-
-X( 5) = ( -1.93266693181973E-08, -1.02465270439289E-07)
-
-PATH NUMBER =       970
-
-ARCLEN =  2.63030363466687E+00
-NFE =  373
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99915174659916E-01
-
-X( 1) = (  1.39743212827710E-01,  2.56855620139221E-01)
-X( 2) = (  2.73638380351906E-01, -6.95721559748487E-01)
-X( 3) = (  2.23223536437011E-01,  6.24622869174656E-01)
-X( 4) = (  7.99477724663706E-01,  3.28622409668996E-02)
-
-X( 5) = ( -4.21727938426257E-01,  5.90385943219115E-01)
-
-PATH NUMBER =       971
-
-ARCLEN =  2.17458852347059E+00
-NFE =  553
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994135765667E-01
-
-X( 1) = (  6.05272107365193E-01, -2.70801085329406E-01)
-X( 2) = (  1.22975758405509E-01, -5.25926040077353E-02)
-X( 3) = ( -1.77483337165152E+00,  6.87784152434494E-01)
-X( 4) = (  9.63704739168679E-01,  1.42255218285215E-02)
-
-X( 5) = (  3.85951127462756E-01,  1.34060959390851E-01)
-
-PATH NUMBER =       972
-
-ARCLEN =  4.35493343550852E+00
-NFE =  213
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.24583492296263E-08
-
-X( 1) = (  2.43737792930888E-01,  2.25515190419008E-01)
-X( 2) = (  1.58391116073886E+08, -3.40865625001109E+08)
-X( 3) = ( -4.44311780154616E+08, -2.27372026850027E+08)
-X( 4) = (  8.30808817683612E-01, -1.11409276606586E-01)
-
-X( 5) = (  8.22463799268671E-10, -1.72658785348428E-09)
-
-PATH NUMBER =       973
-
-ARCLEN =  2.91531908039599E+00
-NFE =  322
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98711081868307E-01
-
-X( 1) = (  6.10663198553628E-01,  1.01962322069085E-01)
-X( 2) = (  1.65299330561988E-01, -4.00996570214231E-01)
-X( 3) = ( -9.68846431212211E-01, -1.46520328269958E-01)
-X( 4) = (  4.35454279866376E-01, -2.16564000567634E-02)
-
-X( 5) = (  1.56983039964315E+00,  2.04272979951134E-01)
-
-PATH NUMBER =       974
-
-ARCLEN =  2.60516305009804E+00
-NFE =  512
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.86700265713974E-01
-
-X( 1) = (  5.57785181313929E-01, -8.63856302472275E-02)
-X( 2) = (  6.50540671398646E-01, -2.79097572090953E-01)
-X( 3) = ( -1.06272162479107E+00, -1.92217116036325E-02)
-X( 4) = (  3.84473564218832E-01,  1.17490296444398E-01)
-
-X( 5) = (  9.62155534143886E-01,  1.03453364703462E+00)
-
-PATH NUMBER =       975
-
-ARCLEN =  2.03076182231562E+00
-NFE =  382
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99901826665088E-01
-
-X( 1) = (  5.62449198915137E-01,  1.33124703659723E-01)
-X( 2) = (  2.47364807734702E-01,  2.31101483888422E-01)
-X( 3) = ( -1.29625215919338E+00,  1.02944776858792E-02)
-X( 4) = (  1.14063971747337E+00,  2.29735280885676E-01)
-
-X( 5) = (  5.64069235997142E-01,  2.06702759408267E-01)
-
-PATH NUMBER =       976
-
-ARCLEN =  3.33826034700250E+00
-NFE =  328
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99987149508908E-01
-
-X( 1) = (  1.35782171028535E+00, -3.07110086251188E-02)
-X( 2) = (  5.33358881442777E-01,  1.35351561801382E+00)
-X( 3) = (  1.25889818753434E-01,  8.23924451062617E-02)
-X( 4) = (  1.32143156976092E+00, -1.12056034949188E+00)
-
-X( 5) = (  2.59271140088505E-02,  6.99734879698373E-01)
-
-PATH NUMBER =       977
-
-ARCLEN =  2.39979082985148E+00
-NFE =  176
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.10020418632691E-13
-
-X( 1) = (  3.00017304891454E+11, -2.14851491084804E+09)
-X( 2) = (  3.55977218425880E+11,  5.70693934152530E+11)
-X( 3) = (  4.97196174838695E-01,  3.37632216340277E-04)
-X( 4) = (  2.15285783711012E+11, -5.31840327061397E+10)
-
-X( 5) = ( -6.19575842453896E-13,  1.72633223905275E-12)
-
-PATH NUMBER =       978
-
-ARCLEN =  2.36082164937949E+00
-NFE =  469
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99078268101349E-01
-
-X( 1) = (  2.47221661278884E-01,  3.08759676273288E-01)
-X( 2) = (  4.80307814444570E-01, -2.13216718452372E-01)
-X( 3) = ( -7.83601584175142E-01,  1.26695045755776E-01)
-X( 4) = (  6.76879579658807E-01,  1.07393911526525E-01)
-
-X( 5) = (  3.39033054158425E-01,  7.09095335107075E-01)
-
-PATH NUMBER =       979
-
-ARCLEN =  1.85688149010192E+00
-NFE =  154
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32729315917597E-13
-
-X( 1) = (  2.39417300022547E+12, -1.22717292728157E+12)
-X( 2) = (  5.07219544575046E+12,  2.93917291128321E+12)
-X( 3) = (  1.50924922003936E+12, -5.24539379961778E+12)
-X( 4) = (  5.21782967659298E-01,  5.96764804464380E-03)
-
-X( 5) = ( -1.16782180713954E-13, -6.70454902533535E-14)
-
-PATH NUMBER =       980
-
-ARCLEN =  2.56528701937500E+00
-NFE =  301
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95763656397971E-01
-
-X( 1) = (  3.21574157057251E-02, -2.56363087561370E-01)
-X( 2) = (  7.37508151369057E-01, -1.94879143594040E-01)
-X( 3) = ( -1.34178500418098E+00,  2.13673928479799E-01)
-X( 4) = (  6.36844129948765E-01,  5.65494296009801E-01)
-
-X( 5) = (  5.28671539999460E-01,  3.05679579924059E-01)
-
-PATH NUMBER =       981
-
-ARCLEN =  2.41710406651316E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99400186320993E-01
-
-X( 1) = (  3.34665706893501E-01, -3.89879255254254E-02)
-X( 2) = (  7.42246746895562E-01, -7.96177989628407E-01)
-X( 3) = ( -1.57263569866310E+00, -2.68361253616904E-01)
-X( 4) = (  6.84080970594232E-01, -2.04017425201019E-01)
-
-X( 5) = (  8.07597043996874E-01, -5.16152024288215E-02)
-
-PATH NUMBER =       982
-
-ARCLEN =  3.76040740594468E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99680450807414E-01
-
-X( 1) = (  6.32111770309874E-01,  4.05566616315144E-01)
-X( 2) = (  5.88996487481450E-01, -6.34209721448368E-01)
-X( 3) = ( -1.38536916725588E+00, -4.73400387181512E-01)
-X( 4) = (  4.10211744987396E-01, -2.40011986346196E-01)
-
-X( 5) = (  1.53536151742430E+00,  5.60340531584832E-01)
-
-PATH NUMBER =       983
-
-ARCLEN =  2.00384215690035E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93997289099360E-01
-
-X( 1) = (  5.82095810582539E-01,  2.77330393068314E-01)
-X( 2) = (  8.01657071150244E-01, -2.03803039967103E-01)
-X( 3) = ( -7.70209157761406E-01, -2.44282744669658E-01)
-X( 4) = (  1.53934137897680E-01, -1.79746370074773E-01)
-
-X( 5) = ( -1.13848068177378E-01,  9.67653306096033E-01)
-
-PATH NUMBER =       984
-
-ARCLEN =  2.58847390093572E+00
-NFE =  351
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997591066480E-01
-
-X( 1) = (  6.84743001218196E-01,  1.97500653666710E+00)
-X( 2) = (  6.52669792667777E-02, -7.22338142609499E-01)
-X( 3) = ( -6.87850799172015E-01,  1.97849985727603E-01)
-X( 4) = (  8.49645784121160E-01,  5.08905001785399E-03)
-
-X( 5) = ( -1.60581317689456E-01,  3.74467137908069E-01)
-
-PATH NUMBER =       985
-
-ARCLEN =  1.95019960875246E+00
-NFE =  241
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.74262757399707E-09
-
-X( 1) = ( -7.56350270297096E+08,  2.61000996518095E+09)
-X( 2) = (  2.30049939396772E-01,  8.79796268967508E-02)
-X( 3) = ( -1.24649699221823E+08,  6.10876663516503E+08)
-X( 4) = (  7.64636401414199E+08, -4.70672311217115E+08)
-
-X( 5) = (  4.97143401749153E-12,  2.34299223794178E-10)
-
-PATH NUMBER =       986
-
-ARCLEN =  1.90673455771756E+00
-NFE =  345
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999892927741E-01
-
-X( 1) = (  2.55979990446728E+00,  2.68568890878834E+00)
-X( 2) = (  4.97634347547644E-01,  7.10502218081021E-01)
-X( 3) = (  3.57082092592252E-01,  1.47337204960665E+00)
-X( 4) = (  4.70205545486078E-01, -1.05632882075459E-01)
-
-X( 5) = ( -8.68117267766883E-02,  1.06550943781246E-01)
-
-PATH NUMBER =       987
-
-ARCLEN =  1.68222825884403E+00
-NFE =  173
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.00072580409624E-12
-
-X( 1) = (  1.62005774703895E+10, -1.02614683373275E+11)
-X( 2) = (  5.62632929995210E+10,  1.21078354142274E+10)
-X( 3) = ( -5.73651081916279E+09, -1.01452190639501E+11)
-X( 4) = (  5.16752710843459E-01,  8.14212145134683E-03)
-
-X( 5) = (  1.85057129125851E-13, -4.46522918466641E-12)
-
-PATH NUMBER =       988
-
-ARCLEN =  2.36641077293639E+00
-NFE =  434
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99523143415821E-01
-
-X( 1) = ( -1.81657116628109E-03,  7.54229285964773E-02)
-X( 2) = (  9.45578721768095E-01, -5.60936502250903E-01)
-X( 3) = ( -1.66106329703947E+00,  1.40986841229577E-01)
-X( 4) = (  7.36663197651929E-01,  2.03597613771325E-01)
-
-X( 5) = (  4.51005317832806E-01,  3.19621115542211E-01)
-
-PATH NUMBER =       989
-
-ARCLEN =  3.11568089647119E+00
-NFE =  196
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.49681315900954E-13
-
-X( 1) = ( -1.96670924504589E+11,  1.35697410851128E+10)
-X( 2) = ( -5.22025078108502E+11, -1.08773526849577E+11)
-X( 3) = (  4.61703702526822E+10,  6.73539165307121E+11)
-X( 4) = (  4.98862226437008E-01, -3.69985618720279E-04)
-
-X( 5) = (  8.97032773582163E-13,  9.53857218904952E-13)
-
-PATH NUMBER =       990
-
-ARCLEN =  3.95280929695718E+00
-NFE =  376
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99909181772765E-01
-
-X( 1) = (  4.82307857491490E-01,  1.06189494947768E-01)
-X( 2) = (  1.15632737426947E+00, -1.39447119934058E+00)
-X( 3) = ( -2.00876403158182E+00, -6.88819091345165E-01)
-X( 4) = (  5.02564682906072E-01, -3.84951341031525E-01)
-
-X( 5) = (  7.85125269707874E-01, -5.87209266297033E-01)
-
-PATH NUMBER =       991
-
-ARCLEN =  2.38778299318297E+00
-NFE =  351
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99277563531628E-01
-
-X( 1) = (  5.50621007082697E-01,  6.27449895520129E-01)
-X( 2) = (  7.13295197590180E-01, -2.62204677186477E-01)
-X( 3) = ( -6.83393939639977E-01, -5.74530103691505E-01)
-X( 4) = (  1.33743179292219E-01, -6.77872107879529E-01)
-
-X( 5) = ( -6.84314761115036E-02,  9.52241170550969E-01)
-
-PATH NUMBER =       992
-
-ARCLEN =  1.59144747457920E+00
-NFE =  368
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94709721518991E-01
-
-X( 1) = (  3.84145275891983E-01,  4.60106023071636E-01)
-X( 2) = (  8.46293197823467E-01, -1.65515938597251E-01)
-X( 3) = ( -3.89152620730363E-01, -3.12583905620215E-01)
-X( 4) = (  1.34906382918886E-01, -4.55953351396644E-01)
-
-X( 5) = ( -1.73548255145246E-01,  6.73067996613133E-01)
-
-PATH NUMBER =       993
-
-ARCLEN =  2.14250298829474E+00
-NFE =  407
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999988E-01
-
-X( 1) = ( -1.35502613499442E+01,  2.01349540052696E+01)
-X( 2) = (  4.67989844293836E-01, -2.63370886432073E-01)
-X( 3) = ( -8.70640385429877E-03, -2.04450888764670E-02)
-X( 4) = (  9.95063069918219E-01, -1.39711723863127E-02)
-
-X( 5) = (  5.21652820402347E-03,  2.90932951468562E-02)
-
-PATH NUMBER =       994
-
-ARCLEN =  1.50610788202426E+00
-NFE =  175
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.93037232906521E-10
-
-X( 1) = ( -1.92911135165381E+08, -5.50471129961543E+09)
-X( 2) = (  5.12123680408851E-01, -3.01380666555923E-01)
-X( 3) = ( -1.87833791231087E+09, -1.28561387975031E+09)
-X( 4) = ( -5.24704431272884E+08,  3.13587989606615E+09)
-
-X( 5) = (  4.20361004848085E-11, -9.15872619172871E-11)
-
-PATH NUMBER =       995
-
-ARCLEN =  1.46555391727752E+00
-NFE =  173
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.60929314255437E-11
-
-X( 1) = (  4.42684146578711E+10,  3.10205407294751E+10)
-X( 2) = (  6.17778367160030E-01,  2.38139204812641E-01)
-X( 3) = (  2.36295765960427E+10, -9.76065083817000E+08)
-X( 4) = ( -1.64971415630299E+10, -1.58713264226376E+10)
-
-X( 5) = ( -9.33048169976525E-12,  2.27287302477161E-12)
-
-PATH NUMBER =       996
-
-ARCLEN =  1.80380625061683E+00
-NFE =  246
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.76742141069799E-06
-
-X( 1) = ( -1.56076904027581E+05,  4.55011955967442E+04)
-X( 2) = ( -3.55429687736260E-01, -6.61698095652541E-02)
-X( 3) = ( -9.15970543251028E+04,  1.50484246949111E+04)
-X( 4) = (  8.71654421630131E-01, -2.06060681749827E-02)
-
-X( 5) = (  2.53855203809011E-06,  1.46427390957255E-06)
-
-PATH NUMBER =       997
-
-ARCLEN =  1.64958770151251E+00
-NFE =  151
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.15870446848412E-13
-
-X( 1) = ( -3.68944618680127E+11, -1.16484214333141E+12)
-X( 2) = (  1.53584250849174E+12, -4.04952645366030E+11)
-X( 3) = ( -2.14245805647843E+12, -1.44952644056872E+12)
-X( 4) = (  4.89079064133118E-01, -1.79354732007167E-02)
-
-X( 5) = (  2.15102268679226E-13, -2.03954529046785E-13)
-
-PATH NUMBER =       998
-
-ARCLEN =  7.16465917409305E+00
-NFE =  228
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.16217066415420E-13
-
-X( 1) = ( -1.35852586819804E+12,  6.77631729442692E+11)
-X( 2) = ( -2.84384892922713E+12, -1.68983455830304E+12)
-X( 3) = ( -8.84058631154198E+11,  2.95042401106996E+12)
-X( 4) = (  5.03462873085107E-01,  3.51408005705128E-04)
-
-X( 5) = (  2.08243253370377E-13,  1.16537205233080E-13)
-
-PATH NUMBER =       999
-
-ARCLEN =  1.17325664706920E+01
-NFE =  529
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99630122563949E-01
-
-X( 1) = ( -9.40666078580140E-02,  2.12725842925805E-01)
-X( 2) = (  1.71824405666044E+00,  1.31661510352155E-02)
-X( 3) = ( -2.62451785789511E-01, -1.24547771894400E+00)
-X( 4) = (  9.55774863791283E-01, -2.77944747231366E-01)
-
-X( 5) = ( -1.18844154230952E+00,  1.76725141278326E+00)
-
-PATH NUMBER =      1000
-
-ARCLEN =  2.16246711160060E+00
-NFE =  210
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.14670848763956E-06
-
-X( 1) = (  6.10851856623947E-01, -5.61495594183764E-02)
-X( 2) = (  1.19371103816708E-01, -1.73845027956050E-03)
-X( 3) = ( -1.50356374158014E+05, -5.85914879043680E+05)
-X( 4) = (  1.51926978178849E+05,  8.46336912262017E+05)
-
-X( 5) = ( -1.34442889566380E-07, -8.87279921234175E-07)
-
-PATH NUMBER =      1001
-
-ARCLEN =  2.07729642732051E+00
-NFE =  218
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.79041785890017E-08
-
-X( 1) = ( -1.15850900800945E+07,  1.32998405180145E+07)
-X( 2) = (  7.22028381571251E-01,  8.59821741323186E-02)
-X( 3) = ( -1.03139788925063E-01, -2.49316140252803E-01)
-X( 4) = (  1.09318725544645E+07, -1.22202718633778E+07)
-
-X( 5) = (  2.37259406272007E-08,  2.93457189773404E-08)
-
-PATH NUMBER =      1002
-
-ARCLEN =  1.32470948579676E+00
-NFE =  349
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99494572603560E-01
-
-X( 1) = ( -8.64356644619291E-02,  9.00747448215578E-01)
-X( 2) = (  8.69208393515579E-01,  1.70519737052788E-01)
-X( 3) = ( -1.58349842581852E-01,  1.36398495033776E-01)
-X( 4) = (  6.01239542628318E-01, -5.67488407845360E-01)
-
-X( 5) = (  6.92054845789455E-03,  3.43426845145346E-01)
-
-PATH NUMBER =      1003
-
-ARCLEN =  1.67196180663246E+00
-NFE =  512
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99927206527173E-01
-
-X( 1) = ( -4.05600151284539E-02,  1.43687829993363E+00)
-X( 2) = (  5.84324610205321E-01,  5.50255220643503E-03)
-X( 3) = ( -7.14073347682022E-01,  1.09552344728211E-01)
-X( 4) = (  6.13973515906666E-01, -3.24627577730478E-01)
-
-X( 5) = (  4.74877822196133E-02,  3.12867133006746E-01)
-
-PATH NUMBER =      1004
-
-ARCLEN =  2.03304740667295E+00
-NFE =  311
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999972E-01
-
-X( 1) = ( -5.51386841063036E+01,  1.62227667406126E+02)
-X( 2) = (  7.14512014479198E-02,  2.60373347333343E-01)
-X( 3) = (  9.14269875986551E-01, -7.83683731239297E-02)
-X( 4) = (  6.21913053788633E+01, -4.33100868595218E+01)
-
-X( 5) = (  4.00492216996587E-04,  4.63592732803226E-03)
-
-PATH NUMBER =      1005
-
-ARCLEN =  1.44022152098247E+00
-NFE =  159
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.09276415376226E-11
-
-X( 1) = ( -2.07550732732030E+09, -8.33533303064444E+09)
-X( 2) = (  4.81683761063905E-01, -2.94961348256494E-01)
-X( 3) = ( -3.41664105558088E+09, -2.74937885122321E+09)
-X( 4) = (  8.07570061426390E+08,  3.41608418671604E+09)
-
-X( 5) = (  3.35770024523056E-11, -4.55319148270211E-11)
-
-PATH NUMBER =      1006
-
-ARCLEN =  1.89701628659710E+00
-NFE =  304
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.07817055584196E-06
-
-X( 1) = (  3.76506413581909E+04, -2.16796187985119E+05)
-X( 2) = (  4.91498388609791E-01,  7.10070714355776E-02)
-X( 3) = ( -6.56011595733908E+03, -1.14408496597527E+05)
-X( 4) = (  4.57781712505413E-01, -1.18813142227209E+00)
-
-X( 5) = (  4.25167446503979E-07, -2.13804863327335E-06)
-
-PATH NUMBER =      1007
-
-ARCLEN =  3.99902971128599E+00
-NFE =  266
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999992601E-01
-
-X( 1) = ( -3.54885351785772E+01, -2.27085602758355E+01)
-X( 2) = (  1.08600193646472E+00, -2.02152790271747E-02)
-X( 3) = (  4.14272926752200E-02, -2.61358432040937E-02)
-X( 4) = (  1.01345970568287E+01,  1.30101038550538E+01)
-
-X( 5) = (  1.74316108284919E-02, -5.36483609279795E-03)
-
-PATH NUMBER =      1008
-
-ARCLEN =  2.62333267087575E+00
-NFE =  243
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999938E-01
-
-X( 1) = ( -3.68587523972231E+01,  1.29205157191799E+02)
-X( 2) = (  1.08656248307869E+00, -2.89500639682168E-02)
-X( 3) = ( -9.70322477947211E-02, -3.44340889469965E-02)
-X( 4) = (  1.19812971903605E+02, -9.18630809993598E+01)
-
-X( 5) = (  2.29428614564701E-03,  6.00474082772605E-03)
-
-PATH NUMBER =      1009
-
-ARCLEN =  2.28998161687318E+00
-NFE =  216
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.32939825681509E-07
-
-X( 1) = (  3.94664237092411E+05,  4.96455814289973E+05)
-X( 2) = (  4.99566322469924E-01, -1.06065294422428E-01)
-X( 3) = (  4.94890634660805E-01,  1.01270362587945E+00)
-X( 4) = ( -1.13075712826664E+06, -1.34427701788226E+06)
-
-X( 5) = ( -1.78214691769500E-07,  6.82760423329561E-07)
-
-PATH NUMBER =      1010
-
-ARCLEN =  1.28335832651619E+00
-NFE =  388
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98002677263615E-01
-
-X( 1) = ( -4.11521557508003E-01,  5.38678038652138E-02)
-X( 2) = (  7.62957959232031E-01,  6.75739872093502E-02)
-X( 3) = ( -6.29484726955570E-01,  2.23357285342893E-01)
-X( 4) = (  7.45658933792959E-01, -5.95120067940333E-01)
-
-X( 5) = (  2.55407555333762E-01,  2.99256868242937E-01)
-
-PATH NUMBER =      1011
-
-ARCLEN =  1.34370228538060E+00
-NFE =  282
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97836499648807E-01
-
-X( 1) = ( -9.55344628377281E-02,  3.55674056902428E-01)
-X( 2) = (  8.93854607369272E-01,  8.49190412419159E-02)
-X( 3) = ( -2.43908381577394E-01,  5.35353204722370E-02)
-X( 4) = (  6.67057639564258E-01, -6.41391342187240E-01)
-
-X( 5) = (  1.05657964460632E-01,  4.64265599221598E-01)
-
-PATH NUMBER =      1012
-
-ARCLEN =  1.36688913770300E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98871968272740E-01
-
-X( 1) = (  6.13128338827377E-01,  1.20610441333848E+00)
-X( 2) = (  1.35539360926138E+00, -1.60396707486664E-02)
-X( 3) = (  1.23998170181870E-01,  7.61206683592085E-03)
-X( 4) = (  1.92107057033665E-01, -1.35161067704340E+00)
-
-X( 5) = ( -1.18644818972051E-01,  2.41387876621439E-01)
-
-PATH NUMBER =      1013
-
-ARCLEN =  1.52790502375971E+00
-NFE =  240
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.23886173894091E-09
-
-X( 1) = ( -1.95934137751306E+09,  2.25792276363688E+09)
-X( 2) = (  5.19727617059726E-01, -2.38399506581077E-01)
-X( 3) = (  6.40862195944431E+08,  1.47637857583042E+09)
-X( 4) = (  2.26521371418972E+09, -1.76150807459923E+09)
-
-X( 5) = (  5.96787738042608E-11,  1.72725947910832E-10)
-
-PATH NUMBER =      1014
-
-ARCLEN =  1.97955984978893E+00
-NFE =  278
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999904E-01
-
-X( 1) = ( -1.21240913126514E+02, -2.21308803136503E+01)
-X( 2) = (  8.26671308333920E-02,  2.13611872780373E-02)
-X( 3) = (  6.79928110983397E+01,  9.29995569865970E+01)
-X( 4) = (  9.84995816234848E-01, -1.89994200646262E-02)
-
-X( 5) = (  2.14137936284791E-03,  5.26934510481430E-03)
-
-PATH NUMBER =      1015
-
-ARCLEN =  1.58732187495538E+00
-NFE =  206
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.80367745123434E-07
-
-X( 1) = ( -1.15456015158936E+06,  1.46488406699813E+04)
-X( 2) = (  4.93900490124045E-01,  1.19276198739664E-01)
-X( 3) = ( -1.43385572204757E+06,  4.31494289549402E+05)
-X( 4) = (  7.29126392131593E-01, -9.03483176110441E-01)
-
-X( 5) = (  2.55417219970002E-07,  1.01588134716836E-07)
-
-PATH NUMBER =      1016
-
-ARCLEN =  1.58095731386093E+00
-NFE =  158
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.85704043558012E-10
-
-X( 1) = ( -1.33165409524965E+08, -7.43678840277897E+06)
-X( 2) = (  4.93131234455620E-01, -2.88349461806561E-01)
-X( 3) = ( -1.41925053553292E+08,  1.36397117760675E+07)
-X( 4) = (  1.17834732897567E+08, -2.33513517455090E+08)
-
-X( 5) = (  1.85862569296790E-09,  3.29245565435909E-10)
-
-PATH NUMBER =      1017
-
-ARCLEN =  2.11788380341997E+00
-NFE =  410
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99930885926875E-01
-
-X( 1) = ( -1.35703037963042E-01,  8.83402946566534E-02)
-X( 2) = (  6.46040130188113E-01, -5.40890424434038E-03)
-X( 3) = ( -1.25090098015192E+00, -5.87025954386382E-01)
-X( 4) = (  1.21214496589050E+00,  3.84796104818426E-01)
-
-X( 5) = (  5.41824988670758E-01,  2.57504029546464E-02)
-
-PATH NUMBER =      1018
-
-ARCLEN =  2.69707090008306E+00
-NFE =  311
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999987131E-01
-
-X( 1) = ( -1.10917324342104E-01,  6.52694190059153E-02)
-X( 2) = (  8.27380875225441E-01, -7.08991394965025E-02)
-X( 3) = ( -2.55171113252350E+01, -2.41039347486337E+01)
-X( 4) = (  3.33616705621573E+01,  3.66159317278069E+01)
-
-X( 5) = (  6.48944244867845E-03, -1.45091842877660E-02)
-
-PATH NUMBER =      1019
-
-ARCLEN =  2.31584873323628E+00
-NFE =  271
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.31987941010201E-06
-
-X( 1) = ( -7.31108083150774E-03, -1.29253788145442E-01)
-X( 2) = (  7.64563750390671E-01,  1.22418809370431E-01)
-X( 3) = (  4.41445112007286E+05,  1.03771008272361E+04)
-X( 4) = ( -6.25975130514948E+05, -2.63397588542670E+04)
-
-X( 5) = ( -1.11060774408891E-06,  4.77735577389502E-07)
-
-PATH NUMBER =      1020
-
-ARCLEN =  2.61017819099188E+00
-NFE =  304
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999886E-01
-
-X( 1) = ( -1.76303024370875E+01,  9.21045057726863E+01)
-X( 2) = (  1.34067876217148E-01,  2.13273147560731E-01)
-X( 3) = (  9.02566934114676E-01, -3.45886686815583E-02)
-X( 4) = (  4.84450798975982E+01, -1.64280890449576E+02)
-
-X( 5) = (  2.72526655019126E-03,  5.55897210740608E-03)
-
-PATH NUMBER =      1021
-
-ARCLEN =  1.86049188269941E+00
-NFE =  221
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.37343373138244E-07
-
-X( 1) = (  2.53365397150856E+05,  1.14479409364642E+06)
-X( 2) = (  1.08043129437529E-01,  2.22761884620011E-01)
-X( 3) = ( -7.51725744170293E+05,  6.90529652285002E+05)
-X( 4) = (  8.97524121063657E-01, -5.11490574105772E-02)
-
-X( 5) = (  5.78957530248986E-09,  4.35699493344505E-07)
-
-PATH NUMBER =      1022
-
-ARCLEN =  2.43079102603514E+00
-NFE =  299
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999997E-01
-
-X( 1) = (  8.22347734262494E+00,  7.85947024085891E+01)
-X( 2) = ( -4.24447973301604E-01, -2.99741503497190E-02)
-X( 3) = ( -6.78558332170658E+00,  2.62353512006562E+00)
-X( 4) = (  8.73721878026602E-01, -1.93990505869649E-03)
-
-X( 5) = ( -3.77493924632430E-03,  8.47990790150847E-03)
-
-PATH NUMBER =      1023
-
-ARCLEN =  1.76573215901037E+00
-NFE =  200
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.41074828718770E-08
-
-X( 1) = (  3.87259677255680E+06, -3.99633717405361E+06)
-X( 2) = ( -1.01398554483693E+00, -5.83725634255961E-02)
-X( 3) = (  3.94548611673697E+06, -6.60394500617380E+06)
-X( 4) = (  7.62566182806752E-01,  1.30999540120619E-02)
-
-X( 5) = ( -2.31187148308357E-08, -4.99720494290799E-08)
-
-PATH NUMBER =      1024
-
-ARCLEN =  1.79083843057403E+00
-NFE =  270
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999962E-01
-
-X( 1) = ( -5.07798603758363E+01, -1.03645356298970E+02)
-X( 2) = (  3.24079984553174E-02,  6.39624556609153E-02)
-X( 3) = ( -3.38302274517274E+01,  3.30721903452493E+01)
-X( 4) = (  1.00626414340261E+00, -5.25333279055615E-03)
-
-X( 5) = (  5.43502985647906E-03, -1.77169267103073E-03)
-
-PATH NUMBER =      1025
-
-ARCLEN =  1.81608816555751E+00
-NFE =  190
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.96752695263290E-08
-
-X( 1) = ( -4.28909560161847E+09, -4.41265568432467E+09)
-X( 2) = (  2.23592738963777E+00,  2.49436287741250E-02)
-X( 3) = ( -3.46636931031126E+09,  3.10989964091675E+08)
-X( 4) = (  5.68850002547985E+09,  8.34429309690193E+09)
-
-X( 5) = (  6.26804256827034E-11, -5.06933252970507E-11)
-
-PATH NUMBER =      1026
-
-ARCLEN =  1.35258942464651E+00
-NFE =  141
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.34653968117327E-11
-
-X( 1) = ( -2.52616589494545E+09, -8.67955441775943E+08)
-X( 2) = (  5.11162036574423E-01, -2.92954027735653E-01)
-X( 3) = ( -2.80004529779986E+09,  3.77867320367054E+09)
-X( 4) = (  3.08769842775009E+09, -4.46731650551866E+09)
-
-X( 5) = (  7.64977527124237E-11,  3.81773755404186E-11)
-
-PATH NUMBER =      1027
-
-ARCLEN =  1.64362310125581E+00
-NFE =  392
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94251764344190E-01
-
-X( 1) = ( -1.65546988746200E-01, -2.48843330433543E-01)
-X( 2) = (  6.85774585890053E-01, -5.35208211132182E-02)
-X( 3) = ( -1.01453557890094E+00,  2.53310850063307E-01)
-X( 4) = (  9.12339929563121E-01, -3.79248469709383E-01)
-
-X( 5) = (  3.78110982255763E-01,  2.27269436636622E-01)
-
-PATH NUMBER =      1028
-
-ARCLEN =  1.31560284066894E+00
-NFE =  315
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97699919472834E-01
-
-X( 1) = (  4.02060723952998E-02, -4.42556783791252E-02)
-X( 2) = (  6.13383454687240E-01,  2.75005055596352E-01)
-X( 3) = ( -9.45409001117422E-01,  2.45022532838652E-02)
-X( 4) = (  1.02300398258245E+00, -8.23818389991316E-02)
-
-X( 5) = (  4.17978100447552E-01,  2.73935245811483E-01)
-
-PATH NUMBER =      1029
-
-ARCLEN =  3.06139177993474E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999528536E-01
-
-X( 1) = (  1.08552670555606E+00,  5.96191880216917E+00)
-X( 2) = (  3.93239559916399E-01, -1.98666985830759E-01)
-X( 3) = (  5.27806131883605E-02, -1.43841972305656E-01)
-X( 4) = (  1.01698955709968E+00, -7.62513072797447E-02)
-
-X( 5) = ( -6.25813719268367E-02,  1.00067049642330E-01)
-
-PATH NUMBER =      1030
-
-ARCLEN =  2.82826948732220E+00
-NFE =  258
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.89146545910442E-07
-
-X( 1) = ( -3.45537562762197E+05,  1.64069119375184E+06)
-X( 2) = ( -7.32485692344494E+05,  9.87771470689948E+04)
-X( 3) = ( -1.36879646817903E-01,  2.80471155889120E-03)
-X( 4) = (  8.89646506509875E-01,  8.26112190833418E-04)
-
-X( 5) = (  7.91393581051037E-08,  5.45319813521114E-07)
-
-PATH NUMBER =      1031
-
-ARCLEN =  1.78157033053698E+00
-NFE =  266
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999994071532E-01
-
-X( 1) = (  1.01660068984106E+00,  1.96508595112894E+01)
-X( 2) = (  5.18116505929580E+00,  1.83292980575997E+01)
-X( 3) = ( -2.77985077672509E-03,  1.04327189590074E-02)
-X( 4) = (  1.00145198011594E+00, -1.09145560259257E-02)
-
-X( 5) = ( -1.19275444349432E-03,  2.21589900710490E-02)
-
-PATH NUMBER =      1032
-
-ARCLEN =  1.34018817525908E+00
-NFE =  216
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.99264020899121E-07
-
-X( 1) = (  8.33958978385164E+05, -1.06107384044721E+05)
-X( 2) = ( -1.44123380442448E-01,  1.70202863598719E-02)
-X( 3) = (  7.66474877660869E+05, -5.43080032263754E+05)
-X( 4) = (  9.51032508028585E-01,  4.73035598922664E-03)
-
-X( 5) = ( -3.36761594321386E-07, -2.33624371963890E-07)
-
-PATH NUMBER =      1033
-
-ARCLEN =  2.14369222060998E+00
-NFE =  327
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98797059265542E-01
-
-X( 1) = ( -1.10964052948491E-02, -3.41165774772338E-01)
-X( 2) = (  2.26908956896273E-01, -8.88548868726015E-02)
-X( 3) = ( -1.55576417228743E-01,  6.90385407486660E-02)
-X( 4) = (  9.92958078568307E-01, -6.25175863239464E-03)
-
-X( 5) = (  1.15140581628060E+00,  1.87538754907834E-01)
-
-PATH NUMBER =      1034
-
-ARCLEN =  1.18404584174790E+01
-NFE =  480
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999993E-01
-
-X( 1) = ( -9.73605923840867E-01,  9.66863818599908E-01)
-X( 2) = (  9.63914609572494E+01, -2.01510502591195E+02)
-X( 3) = ( -1.91497151466462E-01, -2.31011425530466E-01)
-X( 4) = (  8.65329339338680E-01, -3.65329994763025E-03)
-
-X( 5) = ( -3.49570639071276E-03, -1.59819797890768E-03)
-
-PATH NUMBER =      1035
-
-ARCLEN =  1.30633294484833E+00
-NFE =  134
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.95996148155132E-12
-
-X( 1) = (  6.94170646242146E+09, -1.55662344236752E+10)
-X( 2) = (  4.95676158858802E-01, -2.80862856585704E-01)
-X( 3) = ( -2.80252078121613E+10, -9.08437499747893E+09)
-X( 4) = (  1.77660005380539E+10,  8.81378340123166E+09)
-
-X( 5) = (  1.07471296131086E-11, -1.26598016466674E-11)
-
-PATH NUMBER =      1036
-
-ARCLEN =  2.47537773907506E+00
-NFE =  656
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99957094641780E-01
-
-X( 1) = (  3.70852054089668E-01, -9.98695921841316E-02)
-X( 2) = ( -1.36196436240459E-02, -9.42659148641358E-01)
-X( 3) = ( -1.14927344927479E+00, -8.08271237496183E-01)
-X( 4) = (  8.03614052967100E-01, -2.84202034303129E-02)
-
-X( 5) = (  2.64992014407536E-01, -3.90652832714263E-01)
-
-PATH NUMBER =      1037
-
-ARCLEN =  1.52986788012522E+00
-NFE =  365
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99961432737268E-01
-
-X( 1) = (  3.00580952999607E-01, -6.43973852196372E-01)
-X( 2) = (  4.89891387096329E-01,  3.18551185438432E-02)
-X( 3) = ( -1.50999410301020E+00,  5.40628676396440E-01)
-X( 4) = (  1.67746223362425E+00, -3.27581491522707E-01)
-
-X( 5) = (  3.70333190408412E-01,  4.82324123156698E-02)
-
-PATH NUMBER =      1038
-
-ARCLEN =  1.91198226832315E+00
-NFE =  196
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.65296857740959E-08
-
-X( 1) = ( -5.59052239672349E-02, -2.18273494477789E-01)
-X( 2) = (  7.33280618415172E-01,  5.51912230292505E-02)
-X( 3) = ( -2.11974607286973E+06,  6.46815551049381E+06)
-X( 4) = (  5.67321435337475E+06, -6.12103899070284E+06)
-
-X( 5) = (  6.55817941999138E-08,  6.86388148220989E-08)
-
-PATH NUMBER =      1039
-
-ARCLEN =  1.29223390594520E+00
-NFE =  311
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97530462350740E-01
-
-X( 1) = ( -1.37180722880352E-01,  2.41423690859330E-01)
-X( 2) = (  2.41440397196456E-02,  2.28138662665484E-01)
-X( 3) = (  2.23981382508425E-01,  7.41981080959097E-01)
-X( 4) = (  1.00068367810137E+00,  8.70555536131748E-03)
-
-X( 5) = (  1.28495570470373E-01,  4.74246531333436E-01)
-
-PATH NUMBER =      1040
-
-ARCLEN =  2.60683750704572E+00
-NFE =  384
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999919532719E-01
-
-X( 1) = (  1.07510957336311E+00,  2.08314905691861E-02)
-X( 2) = (  1.67843941654838E+01,  2.31033264972825E+00)
-X( 3) = (  5.64815616966293E-02,  1.14752363736380E-02)
-X( 4) = (  9.42794318043319E+00, -5.98137773898799E+00)
-
-X( 5) = ( -4.15138319018190E-02,  5.50734857827503E-02)
-
-PATH NUMBER =      1041
-
-ARCLEN =  2.23515290918056E+00
-NFE =  420
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99765752907763E-01
-
-X( 1) = (  3.55175535982150E-01,  2.67519138646364E-01)
-X( 2) = (  3.74521163849765E-01,  1.99755019217177E-01)
-X( 3) = ( -1.07554830935142E+00, -1.26724426695878E-01)
-X( 4) = (  9.99734793116940E-01,  8.52895823453768E-02)
-
-X( 5) = (  5.34371485687385E-01,  3.29249624628416E-01)
-
-PATH NUMBER =      1042
-
-ARCLEN =  2.15042213684103E+00
-NFE =  273
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999991E-01
-
-X( 1) = (  1.97506857309600E+01,  2.22964786817020E+02)
-X( 2) = (  9.65157624296087E+02,  1.18622232858848E+03)
-X( 3) = (  8.49903646637278E-01,  1.12413296414540E-01)
-X( 4) = (  1.28864561705891E-01, -7.72269675691831E-02)
-
-X( 5) = ( -3.10818243408559E-05,  4.81775283750604E-04)
-
-PATH NUMBER =      1043
-
-ARCLEN =  1.55259312808884E+00
-NFE =  204
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.88093288496017E-08
-
-X( 1) = (  1.62789151041506E+07,  3.38097940349251E+06)
-X( 2) = (  6.54637170366793E-03,  5.56142498511892E-02)
-X( 3) = ( -4.43977781195927E+04, -3.39917287830411E+07)
-X( 4) = (  9.74473527646516E-01, -2.98402938628592E-02)
-
-X( 5) = ( -6.60095579796882E-09, -1.68941430913087E-08)
-
-PATH NUMBER =      1044
-
-ARCLEN =  3.58420056550621E+00
-NFE =  230
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999957E-01
-
-X( 1) = (  1.44681582179841E+02, -1.08881515818179E+02)
-X( 2) = (  1.25610477232002E+01, -8.26893867061156E+02)
-X( 3) = ( -9.07873410434108E-02, -2.48037246776419E-02)
-X( 4) = (  9.29584329700940E-01, -3.53938426055442E-02)
-
-X( 5) = ( -5.08554650212223E-04, -6.46343881092255E-04)
-
-PATH NUMBER =      1045
-
-ARCLEN =  1.78433827697966E+00
-NFE =  237
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99969073317899E-01
-
-X( 1) = (  1.21771505342244E+00, -4.77911131016655E-01)
-X( 2) = (  3.60223210451824E-01, -2.00872748196345E-01)
-X( 3) = ( -1.86318256780830E+00, -1.38883269745427E+00)
-X( 4) = (  5.90511465987882E-01,  6.45005111835434E-01)
-
-X( 5) = (  1.45743012073387E-01, -3.24694529585307E-01)
-
-PATH NUMBER =      1046
-
-ARCLEN =  1.46785307326289E+00
-NFE =  272
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99894076348533E-01
-
-X( 1) = (  1.81790556939868E-01, -7.00896602527551E-02)
-X( 2) = (  4.44673191856647E-01, -2.16233773259737E-01)
-X( 3) = ( -1.46145088577131E+00, -4.94273861432405E-02)
-X( 4) = (  1.05814299086927E+00,  7.54154496049781E-02)
-
-X( 5) = (  5.06659522214287E-01,  7.50813159625046E-02)
-
-PATH NUMBER =      1047
-
-ARCLEN =  3.63928472619115E+00
-NFE =  534
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999875E-01
-
-X( 1) = (  9.00241578101091E+01,  6.48590270670817E+01)
-X( 2) = (  4.82545715224047E-01, -1.04448552375192E-01)
-X( 3) = (  6.04851896516571E-01,  9.88203570765237E-01)
-X( 4) = ( -1.29229188929228E+01, -8.96716247399852E+01)
-
-X( 5) = ( -6.85567676223459E-03,  4.22034777646934E-03)
-
-PATH NUMBER =      1048
-
-ARCLEN =  2.69945394554806E+00
-NFE =  356
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999988730035E-01
-
-X( 1) = ( -1.05663063684994E+00,  7.38650398107212E+00)
-X( 2) = ( -3.86808548356176E-01,  1.83182993460091E-01)
-X( 3) = (  2.15165641841114E-01, -2.37048538982115E+00)
-X( 4) = (  8.65061986245934E-01,  1.11975904999170E-02)
-
-X( 5) = ( -3.45203738579818E-02,  1.35688552593804E-01)
-
-PATH NUMBER =      1049
-
-ARCLEN =  1.83080602142347E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996791092511E-01
-
-X( 1) = ( -1.10068909178792E-01,  3.77032132340406E+00)
-X( 2) = ( -2.12331412011377E+00,  8.65975032724332E-01)
-X( 3) = (  5.87420247236813E-01,  2.99887750601227E-01)
-X( 4) = (  5.75991739971664E-01, -1.61527097996524E-01)
-
-X( 5) = (  1.85627047757202E-02,  1.98303476149043E-01)
-
-PATH NUMBER =      1050
-
-ARCLEN =  7.62781478964567E+00
-NFE =  256
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.99972123572928E-13
-
-X( 1) = (  1.94061139809048E+12,  1.45808180203843E+13)
-X( 2) = ( -2.50795168989065E+13,  3.20876370949795E+13)
-X( 3) = (  1.44524772650759E+13, -1.46238266474220E+13)
-X( 4) = (  4.80285192659362E-01, -2.26578684957774E-02)
-
-X( 5) = (  5.04899670249886E-14,  1.89383556579992E-14)
-
-PATH NUMBER =      1051
-
-ARCLEN =  3.34279021392204E+00
-NFE =  362
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98284626111194E-01
-
-X( 1) = (  4.13460881309842E-01, -3.73970216399854E-01)
-X( 2) = (  5.88954870368455E-01, -4.13911810662171E-01)
-X( 3) = ( -9.88559646864168E-01, -1.94634259330769E-01)
-X( 4) = (  7.19512710041699E-01,  5.11397224242641E-01)
-
-X( 5) = (  1.06044519025693E+00, -8.62728314218434E-01)
-
-PATH NUMBER =      1052
-
-ARCLEN =  2.99394060557202E+00
-NFE =  299
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999849E-01
-
-X( 1) = ( -1.17498635965116E-01, -4.42365971167400E-03)
-X( 2) = ( -2.73385275678721E+02,  2.45122614068744E+02)
-X( 3) = (  9.17991239940992E+00,  9.74941757458032E+01)
-X( 4) = (  8.94254669196572E-01, -1.51978449736474E-03)
-
-X( 5) = (  2.13842299100428E-03,  7.78411020435182E-04)
-
-PATH NUMBER =      1053
-
-ARCLEN =  3.83797852722026E+00
-NFE =  481
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99784085732717E-01
-
-X( 1) = (  4.79893903287908E-01, -1.70650916530293E-01)
-X( 2) = ( -2.30241480173110E-01, -7.07785025857869E-01)
-X( 3) = ( -5.24008721212221E-01,  1.57988261870928E-01)
-X( 4) = (  7.21482267764116E-01,  7.32888937763571E-02)
-
-X( 5) = (  8.91041235847137E-01, -1.05566778482231E+00)
-
-PATH NUMBER =      1054
-
-ARCLEN =  2.22224945995709E+00
-NFE =  201
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.11432288107769E-11
-
-X( 1) = (  1.59401268232277E+10,  7.70458369239248E+09)
-X( 2) = (  4.99713333833724E-01, -2.67968312038712E-01)
-X( 3) = (  2.50606369156859E+09, -2.81098693181873E+10)
-X( 4) = ( -5.53142125109972E+09,  8.74027056189338E+09)
-
-X( 5) = ( -1.32824388423755E-11, -1.54163008856019E-11)
-
-PATH NUMBER =      1055
-
-ARCLEN =  4.84460398264347E+00
-NFE =  567
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99615047916621E-01
-
-X( 1) = (  6.97425962577235E-01,  2.90561821500723E-01)
-X( 2) = (  4.64318183729477E-01, -3.17425380632101E-01)
-X( 3) = ( -8.14039779461714E-01, -1.13880113495967E+00)
-X( 4) = (  2.95642507988483E-01,  4.52074791220792E-01)
-
-X( 5) = ( -2.98700284268706E-01, -1.09188841819148E+00)
-
-PATH NUMBER =      1056
-
-ARCLEN =  6.93402726663578E+00
-NFE =  479
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99981520061169E-01
-
-X( 1) = (  2.81818567341002E-01,  5.73655285454795E-01)
-X( 2) = (  5.14457064901275E-01, -3.52660112512420E-01)
-X( 3) = ( -1.66744527847963E+00,  9.51277726968078E-02)
-X( 4) = (  8.26271857920336E-01,  3.77717104491559E-01)
-
-X( 5) = (  4.07220241266683E-01,  3.74144459315773E-01)
-
-PATH NUMBER =      1057
-
-ARCLEN =  8.83040465814487E+00
-NFE =  348
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97748667517250E-01
-
-X( 1) = (  2.51237133517079E-02,  5.46173267533642E-01)
-X( 2) = ( -1.10776326509297E+00, -2.72720665867310E-01)
-X( 3) = (  7.50889902759276E-01, -6.86668201004488E-02)
-X( 4) = (  3.24516393733128E-01,  6.60675140435118E-01)
-
-X( 5) = ( -2.55438128638630E+00, -2.07459793191818E-02)
-
-PATH NUMBER =      1058
-
-ARCLEN =  3.08501750797397E+01
-NFE =  333
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999959E-01
-
-X( 1) = ( -6.77556471187672E-02,  1.58662027292336E-01)
-X( 2) = ( -6.75557999111558E+01, -4.73828104408764E+02)
-X( 3) = (  9.59581414332064E-01,  1.24812102973382E-01)
-X( 4) = (  3.70519241158975E+02,  2.87856060185152E+02)
-
-X( 5) = ( -5.06187729189064E-04, -1.09266988566668E-03)
-
-PATH NUMBER =      1059
-
-ARCLEN =  3.86603644214323E+00
-NFE =  254
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.23971263095066E-08
-
-X( 1) = (  6.36387344767205E-01, -2.96297383173873E-03)
-X( 2) = ( -1.75828785257570E+00,  3.56504054254699E-01)
-X( 3) = (  7.60354564721547E+07, -4.59988489607597E+07)
-X( 4) = ( -6.88327227887833E+07, -1.84550322216337E+07)
-
-X( 5) = ( -8.61351870943194E-09, -2.06003879319600E-09)
-
-PATH NUMBER =      1060
-
-ARCLEN =  2.83044504923555E+00
-NFE =  195
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.10582298402572E-13
-
-X( 1) = (  2.38355459104132E+11, -3.09856190073887E+12)
-X( 2) = (  6.39929950789839E+12, -3.44991756216499E+12)
-X( 3) = ( -2.36939283710530E+12, -1.62333078236604E+12)
-X( 4) = (  4.66632857213489E-01,  2.39153109980328E-02)
-
-X( 5) = ( -1.10692081585831E-13, -1.35918891159409E-13)
-
-PATH NUMBER =      1061
-
-ARCLEN =  3.05807180381563E+00
-NFE =  392
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99837783426664E-01
-
-X( 1) = (  1.57479809772625E-01,  4.61324333285217E-01)
-X( 2) = (  4.47808462856930E-01, -3.50076688310764E-01)
-X( 3) = ( -1.05957239835532E+00, -4.46148521709854E-01)
-X( 4) = (  6.91028951812845E-01,  1.88252564159149E-01)
-
-X( 5) = (  9.04627561615153E-01,  4.57742448258436E-01)
-
-PATH NUMBER =      1062
-
-ARCLEN =  3.04301805459238E+00
-NFE =  312
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.88172339896654E-06
-
-X( 1) = (  8.29193481319800E-01,  6.07685926257156E-02)
-X( 2) = (  8.80753929257901E-01, -1.80761762700964E+00)
-X( 3) = (  5.73457877796629E+05, -4.52229514762897E+05)
-X( 4) = ( -3.14637165401367E-02,  1.86503374171867E-01)
-
-X( 5) = ( -7.53404484436570E-07, -6.54893991139469E-07)
-
-PATH NUMBER =      1063
-
-ARCLEN =  3.49006733999231E+00
-NFE =  338
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999551902E-01
-
-X( 1) = (  5.03240256965596E-01, -2.50093138773593E-01)
-X( 2) = (  1.39360554826486E+01, -2.36671591463306E+01)
-X( 3) = ( -6.82408189147374E+00, -1.42734350384256E+01)
-X( 4) = (  4.97676441397664E-01,  2.16598343712179E-01)
-
-X( 5) = ( -1.53453823940622E-02, -2.29755273262230E-02)
-
-PATH NUMBER =      1064
-
-ARCLEN =  6.32067035746021E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96697847537853E-01
-
-X( 1) = (  2.10459357615478E-01,  7.49436139609571E-02)
-X( 2) = (  6.02511895627270E-01, -1.63144036884737E-01)
-X( 3) = ( -8.22936905062983E-01, -5.72375040040824E-01)
-X( 4) = (  5.44461384165104E-01,  9.05718576954234E-02)
-
-X( 5) = (  1.33579894554525E+00,  2.41591352251997E-01)
-
-PATH NUMBER =      1065
-
-ARCLEN =  4.10168750185221E+00
-NFE =  377
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99987490664281E-01
-
-X( 1) = (  8.49622527493822E-01,  1.15332767573877E+00)
-X( 2) = (  2.69435472420140E-01, -4.89704960629828E-02)
-X( 3) = ( -1.41432337739406E+00, -3.60832881870264E-01)
-X( 4) = (  8.11494975713667E-01,  8.80621702193066E-02)
-
-X( 5) = (  3.38269423474891E-01,  6.85585734250694E-01)
-
-PATH NUMBER =      1066
-
-ARCLEN =  4.98192172899238E+00
-NFE =  331
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999430953724E-01
-
-X( 1) = (  8.90171206447828E-01,  4.88855375933699E+00)
-X( 2) = ( -4.27951471929799E+00, -5.38979580750159E-01)
-X( 3) = ( -4.23857349760699E-01, -1.64722953482602E-01)
-X( 4) = (  8.74980082707557E-01, -4.96950987369795E-03)
-
-X( 5) = (  1.60349621396985E-01,  3.90581138344084E-01)
-
-PATH NUMBER =      1067
-
-ARCLEN =  4.28261986302503E+00
-NFE =  370
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991131057100E-01
-
-X( 1) = ( -1.85028975654522E-01,  1.11344667764907E+00)
-X( 2) = (  5.86845676909458E-01, -4.39476730542232E-01)
-X( 3) = ( -1.05290576166589E+00, -1.15217797511473E+00)
-X( 4) = (  6.11650375324129E-01,  1.93723535828661E-01)
-
-X( 5) = (  8.57916049906769E-01,  6.16099853176220E-01)
-
-PATH NUMBER =      1068
-
-ARCLEN =  2.36599165249226E+00
-NFE =  152
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.07427897516889E-11
-
-X( 1) = ( -4.87488063248612E+10, -4.32943526621220E+10)
-X( 2) = (  2.05053536939275E+10, -6.89432444996200E+10)
-X( 3) = (  5.00375788927787E-01, -6.50017081526520E-04)
-X( 4) = ( -9.73740137596394E+09, -1.87142955490660E+10)
-
-X( 5) = (  4.86744905449019E-12, -1.38770849195460E-11)
-
-PATH NUMBER =      1069
-
-ARCLEN =  1.71812364588746E+00
-NFE =  131
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32056635924711E-13
-
-X( 1) = ( -1.20140174787064E+13,  2.55051560732549E+11)
-X( 2) = ( -5.95560556962842E+12, -1.66402749323918E+13)
-X( 3) = ( -9.13835638916599E+12,  6.86100532744249E+12)
-X( 4) = (  4.91247120633067E-01, -1.76963814405968E-03)
-
-X( 5) = (  4.93151526559377E-14, -6.25069657492205E-15)
-
-PATH NUMBER =      1070
-
-ARCLEN =  2.04983303879709E+00
-NFE =  169
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.59831768311527E-13
-
-X( 1) = ( -1.49526518603530E+11, -4.22161206997342E+11)
-X( 2) = (  3.40244650550649E+11, -1.54694499790707E+12)
-X( 3) = ( -7.98056033864337E+11, -1.75873668604350E+11)
-X( 4) = (  4.95373407201104E-01, -7.28005625467161E-03)
-
-X( 5) = (  1.89104645571120E-14, -5.60782269145438E-13)
-
-PATH NUMBER =      1071
-
-ARCLEN =  2.59546657782628E+00
-NFE =  272
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.77871949609192E-07
-
-X( 1) = (  9.04083793059486E-01,  1.20051979536691E-02)
-X( 2) = ( -6.32426940596775E+06, -5.62243748682455E+06)
-X( 3) = ( -4.30003192750383E+06,  8.52878492527038E+05)
-X( 4) = (  2.53076621938608E-01,  9.12259278700423E-02)
-
-X( 5) = (  5.91769853167633E-08, -6.75057699433125E-08)
-
-PATH NUMBER =      1072
-
-ARCLEN =  1.79795465209881E+01
-NFE =  373
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99772131547222E-01
-
-X( 1) = (  4.89568116637586E-01,  7.03696465958548E-01)
-X( 2) = (  8.45226766243263E-01, -4.42563786589935E-01)
-X( 3) = ( -2.98421508936446E-01, -1.56943167147027E+00)
-X( 4) = (  1.91753743773841E-01, -4.06481033154575E-01)
-
-X( 5) = ( -9.51110229567186E-01, -4.09791095102252E-01)
-
-PATH NUMBER =      1073
-
-ARCLEN =  3.46334834172224E+00
-NFE =  379
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97330195892099E-01
-
-X( 1) = (  2.94595412163396E-01,  5.04755807926517E-01)
-X( 2) = (  6.03287960641508E-01, -1.29364033985710E-01)
-X( 3) = ( -5.78684805556883E-01, -7.91637735164937E-01)
-X( 4) = (  2.93062366791058E-01, -5.09142371728284E-02)
-
-X( 5) = (  3.42526956672724E-01,  1.89042303925423E+00)
-
-PATH NUMBER =      1074
-
-ARCLEN =  1.86862567216313E+00
-NFE =  409
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998042135199E-01
-
-X( 1) = ( -1.61392870415851E+00,  1.61996560820052E+00)
-X( 2) = (  4.78723520594340E-01,  5.88714569916000E-02)
-X( 3) = ( -1.85765441536231E-01, -1.04675929876013E+00)
-X( 4) = (  1.18700462958738E+00, -5.74925184737252E-01)
-
-X( 5) = (  2.12773720259174E-01,  2.34002509478534E-01)
-
-PATH NUMBER =      1075
-
-ARCLEN =  2.09395783511447E+00
-NFE =  327
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999988716E-01
-
-X( 1) = ( -1.70115763121736E+01,  2.59456963342299E+01)
-X( 2) = (  4.94382870604162E-01,  4.91455180096105E-01)
-X( 3) = (  4.87077732823527E-01, -1.95406115905076E-01)
-X( 4) = (  1.48956830869087E+01, -3.39906200612760E+00)
-
-X( 5) = (  8.43159401019577E-03,  2.45411939645891E-02)
-
-PATH NUMBER =      1076
-
-ARCLEN =  2.03705700262370E+00
-NFE =  304
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999852E-01
-
-X( 1) = (  2.51755330835332E+00,  1.91450501604667E+01)
-X( 2) = ( -3.98084085085183E-02,  5.40490647382199E-03)
-X( 3) = (  8.36285200087136E-01, -1.69139924204170E-01)
-X( 4) = (  1.02055568757378E+00,  2.07909750444619E-02)
-
-X( 5) = ( -1.97782858734556E-02,  3.16647917071140E-02)
-
-PATH NUMBER =      1077
-
-ARCLEN =  1.94305571555419E+00
-NFE =  319
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999801199E-01
-
-X( 1) = (  1.36138331700523E+01, -7.72434593569998E+00)
-X( 2) = (  3.32039421119093E+00,  7.80565912186794E-01)
-X( 3) = (  1.00131521581126E+00,  5.50738199141297E-04)
-X( 4) = (  9.27691714817721E-03,  6.35643533819192E-03)
-
-X( 5) = ( -3.69784882670288E-02, -3.02683046961655E-02)
-
-PATH NUMBER =      1078
-
-ARCLEN =  1.86186956946007E+00
-NFE =  185
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.79424159809335E-12
-
-X( 1) = (  7.01774506928194E+09, -7.43230600822353E+10)
-X( 2) = (  4.08957118397781E+10,  6.16089878469535E+09)
-X( 3) = ( -8.66369000097723E+09, -7.25055869706447E+10)
-X( 4) = (  4.92943947927461E-01, -1.28962617981170E-02)
-
-X( 5) = (  6.44761560765136E-13, -6.18549368626084E-12)
-
-PATH NUMBER =      1079
-
-ARCLEN =  1.68229898827632E+01
-NFE =  420
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.48440645235742E-06
-
-X( 1) = (  1.52705520613789E+06,  1.73965885430598E+06)
-X( 2) = ( -1.40257008659107E+06,  1.31304784074370E+06)
-X( 3) = (  7.37161700842777E-02,  2.76173626834653E-03)
-X( 4) = (  9.14156594761960E-01,  1.11678694044824E-02)
-
-X( 5) = ( -2.45171213018137E-07,  5.71780946597854E-07)
-
-PATH NUMBER =      1080
-
-ARCLEN =  7.45482989328845E+00
-NFE =  316
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988794319977E-01
-
-X( 1) = (  3.51842291682974E-01,  1.42890319429688E-01)
-X( 2) = (  2.11072304269150E+00, -2.40298197716661E-01)
-X( 3) = ( -1.34822616843200E-02, -2.27532156359989E+00)
-X( 4) = (  3.98660544849826E-01, -3.22440535172918E-01)
-
-X( 5) = ( -4.33727114796009E-01, -2.50494760972609E-01)
-
-PATH NUMBER =      1081
-
-ARCLEN =  1.14980263560695E+01
-NFE =  434
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999908E-01
-
-X( 1) = ( -8.77312951004068E+01, -1.46142579232781E+01)
-X( 2) = (  1.18112263270129E+00, -4.06664401897258E-02)
-X( 3) = (  2.65557886094680E-02, -6.08093688079915E-02)
-X( 4) = (  1.59575203520965E+02,  7.50673859999927E+01)
-
-X( 5) = (  6.04713468901461E-03, -3.68499678183776E-03)
-
-PATH NUMBER =      1082
-
-ARCLEN =  1.86121177471663E+00
-NFE =  460
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99464487195422E-01
-
-X( 1) = ( -1.30875935811872E-01,  4.37788947162872E-01)
-X( 2) = (  7.17247697174700E-01, -4.15635180887037E-03)
-X( 3) = ( -4.89531963411121E-01, -8.10120705899336E-01)
-X( 4) = (  5.12223117564253E-01, -3.55166360753155E-01)
-
-X( 5) = (  6.27018958847228E-01,  6.60065170708540E-01)
-
-PATH NUMBER =      1083
-
-ARCLEN =  2.25352566835986E+00
-NFE =  315
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.53772183870104E-06
-
-X( 1) = ( -3.39821624528374E+05, -2.64508985762360E+04)
-X( 2) = (  7.68280729766121E-01, -7.67204548353436E-02)
-X( 3) = ( -2.03633106647917E-01,  1.81790943145395E-01)
-X( 4) = (  1.25518254149928E+05,  9.19729135146771E+04)
-
-X( 5) = (  2.29238828745651E-06,  3.41384449613639E-07)
-
-PATH NUMBER =      1084
-
-ARCLEN =  2.13509845141984E+00
-NFE =  249
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999981E-01
-
-X( 1) = (  6.68187595080079E+01,  1.77713632399173E+02)
-X( 2) = (  1.29037824847288E+00, -1.58625639559744E-02)
-X( 3) = (  1.26411453294680E-01, -1.45507272438208E-02)
-X( 4) = (  8.16506417519741E+01, -1.31236341448443E+02)
-
-X( 5) = ( -2.24560025431053E-03,  4.41498032688055E-03)
-
-PATH NUMBER =      1085
-
-ARCLEN =  1.74408437926828E+00
-NFE =  233
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.19356341137075E-07
-
-X( 1) = ( -1.26404187538200E+06,  4.98720960239173E+05)
-X( 2) = ( -2.13233421287109E+00, -6.93637107299525E-01)
-X( 3) = (  6.33349446948122E-01, -2.54788814028952E-02)
-X( 4) = (  6.08776744510387E+05,  1.18452185160040E+05)
-
-X( 5) = (  4.80359521734888E-07,  3.30232514759337E-07)
-
-PATH NUMBER =      1086
-
-ARCLEN =  1.50068786837462E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99983398284488E-01
-
-X( 1) = (  1.80216922882458E+00,  1.50308628094935E+00)
-X( 2) = (  4.77339247688593E-01,  4.90900740163356E-01)
-X( 3) = (  6.46753994430672E-01, -1.70517549810424E-01)
-X( 4) = ( -6.43684336741297E-01, -4.31007830957407E-01)
-
-X( 5) = ( -1.75057101407331E-01,  1.36756343478897E-01)
-
-PATH NUMBER =      1087
-
-ARCLEN =  4.47860353458586E+00
-NFE =  257
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.31683990179778E-12
-
-X( 1) = (  1.14509922576606E+12,  5.03109747429254E+11)
-X( 2) = (  1.67115862698695E+12,  3.68700897523579E+12)
-X( 3) = (  4.59717923497147E+11, -1.02732361842481E+12)
-X( 4) = (  5.46546942635033E-01, -3.98956932818942E-03)
-
-X( 5) = ( -9.39387727761504E-14,  2.86924238708519E-13)
-
-PATH NUMBER =      1088
-
-ARCLEN =  4.66702354874620E+00
-NFE =  628
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99977889972555E-01
-
-X( 1) = ( -4.66602775473551E-01, -1.63603756306497E+00)
-X( 2) = (  1.16961378161867E+00, -1.44640293286180E-01)
-X( 3) = (  3.20303365965506E-02, -8.89905968585645E-02)
-X( 4) = (  1.06928975334347E+00,  7.84813523977009E-01)
-
-X( 5) = (  3.99869568556930E-01, -7.16213407989180E-01)
-
-PATH NUMBER =      1089
-
-ARCLEN =  1.51028930258114E+01
-NFE =  509
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99982363814464E-01
-
-X( 1) = (  3.07082226654985E-01,  6.56840700507567E-01)
-X( 2) = (  6.04338025661086E-01, -2.19509668902363E-01)
-X( 3) = ( -1.71448647795461E-01, -2.30669233402883E+00)
-X( 4) = (  7.15092016023208E-02, -1.62495480852561E+00)
-
-X( 5) = (  2.58937265504747E-01, -9.90642276356424E-01)
-
-PATH NUMBER =      1090
-
-ARCLEN =  2.75543468098307E+00
-NFE =  217
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.21424402362674E-07
-
-X( 1) = ( -3.79895042243664E+06, -9.12361921183485E+05)
-X( 2) = (  4.56491429104208E-01,  9.88779701545618E-02)
-X( 3) = (  7.88147631104747E-01, -8.86694012035962E-01)
-X( 4) = (  3.53680487547884E+06,  8.41289895106805E+05)
-
-X( 5) = (  1.66181810125967E-07, -3.31673015350163E-08)
-
-PATH NUMBER =      1091
-
-ARCLEN =  2.08600758000616E+00
-NFE =  515
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99931985715055E-01
-
-X( 1) = ( -2.28715435753677E-01,  5.60302667176394E-01)
-X( 2) = (  6.29536639506250E-01,  1.39059054708464E-01)
-X( 3) = ( -4.24257296060152E-01, -8.97148338955970E-01)
-X( 4) = (  1.13934986518524E+00, -6.75468073086770E-01)
-
-X( 5) = (  6.09475440554418E-01,  3.38255818536510E-01)
-
-PATH NUMBER =      1092
-
-ARCLEN =  2.59568269018888E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999960E-01
-
-X( 1) = ( -2.33103269114069E+01,  1.19491785038869E+02)
-X( 2) = (  1.13004598836902E+00,  4.81494101768145E-02)
-X( 3) = ( -4.62954922298824E-02,  6.12516471062172E-02)
-X( 4) = (  1.14608542654932E+02, -1.71540370678890E+02)
-
-X( 5) = (  2.85862329141867E-03,  5.04610846158317E-03)
-
-PATH NUMBER =      1093
-
-ARCLEN =  2.12345839670731E+00
-NFE =  254
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999997078651E-01
-
-X( 1) = ( -2.56629901863988E+00,  5.12116717562389E+00)
-X( 2) = ( -3.05119683827601E-02,  2.29810820805078E-01)
-X( 3) = (  5.69516952702534E-01,  2.81178693519762E-02)
-X( 4) = (  1.03198688893309E+00,  9.48193137619850E-02)
-
-X( 5) = (  6.62388489886921E-03,  1.19092916543533E-01)
-
-PATH NUMBER =      1094
-
-ARCLEN =  1.96874255068127E+00
-NFE =  237
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.49918351989784E-09
-
-X( 1) = ( -6.87282434806983E+08,  1.23078018650245E+08)
-X( 2) = (  4.43284657150585E-01,  1.30402400400384E-01)
-X( 3) = ( -1.22095993691172E+07,  2.60389191933647E+08)
-X( 4) = (  8.62469080881935E+08,  5.17414641457265E+07)
-
-X( 5) = (  8.50449892746043E-10,  3.56365137160926E-10)
-
-PATH NUMBER =      1095
-
-ARCLEN =  1.61094742907073E+00
-NFE =  423
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999040795E-01
-
-X( 1) = ( -3.11522441821831E+01,  7.87975685494786E+00)
-X( 2) = ( -2.73928267115363E+01,  2.33762413765285E+01)
-X( 3) = (  5.62347924839291E-03,  2.03890491459948E-03)
-X( 4) = (  9.94705411672226E-01, -1.73591338597471E-03)
-
-X( 5) = (  1.13606088424944E-02,  4.11546440876478E-03)
-
-PATH NUMBER =      1096
-
-ARCLEN =  1.65312073268929E+00
-NFE =  266
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999491E-01
-
-X( 1) = ( -2.02129547778817E+01, -5.94333246507627E+01)
-X( 2) = (  3.97734424822895E-02,  2.04627928436526E-02)
-X( 3) = ( -2.10957652190313E+01, -2.77316500606448E+01)
-X( 4) = (  9.92114222660841E-01,  5.10335357998583E-03)
-
-X( 5) = (  4.98560996503916E-03, -5.53644802972371E-03)
-
-PATH NUMBER =      1097
-
-ARCLEN =  3.16449510492380E+00
-NFE =  244
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.54961467954929E-07
-
-X( 1) = (  1.26842027810287E+06, -1.01057192730810E+06)
-X( 2) = (  2.86222589609124E-02, -1.56668110488060E-01)
-X( 3) = (  1.04451699962863E+06, -1.86508219108837E+06)
-X( 4) = (  9.55461061929470E-01,  3.91167138631746E-02)
-
-X( 5) = ( -8.79547108395876E-08, -1.72618408977670E-07)
-
-PATH NUMBER =      1098
-
-ARCLEN =  5.20185181437262E+00
-NFE =  376
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999989E-01
-
-X( 1) = ( -5.81508717970926E+01,  5.17978372250927E+01)
-X( 2) = (  9.46679210857434E-01, -9.13862662186347E-02)
-X( 3) = (  1.29099755065246E-03,  3.29690990309162E-03)
-X( 4) = (  1.41739406127833E+02, -1.47374633200137E+02)
-
-X( 5) = (  5.39483671119588E-03,  2.10959921823673E-03)
-
-PATH NUMBER =      1099
-
-ARCLEN =  1.86779790428520E+00
-NFE =  222
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.07705803414991E-10
-
-X( 1) = ( -2.11384219130105E+08, -5.05734014703138E+08)
-X( 2) = (  5.05016393646575E-01,  2.73618956264491E-01)
-X( 3) = ( -3.41415720165595E+08, -4.54906651366154E+08)
-X( 4) = (  7.74752342690500E+08, -1.10336593708155E+08)
-
-X( 5) = (  3.29358019833916E-10, -3.77673807158696E-10)
-
-PATH NUMBER =      1100
-
-ARCLEN =  2.60387223197448E+00
-NFE =  256
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.32028859345472E-06
-
-X( 1) = ( -2.41522974793619E+05,  1.19642907192291E+05)
-X( 2) = (  7.34635299476532E-01, -1.03286977515292E-01)
-X( 3) = (  9.33115254699774E-02,  1.18565103216681E-01)
-X( 4) = (  4.63083524931462E+05, -1.58787667230211E+05)
-
-X( 5) = (  2.16883091795365E-06,  3.87561991340368E-07)
-
-PATH NUMBER =      1101
-
-ARCLEN =  6.16903917888443E+00
-NFE =  461
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999995426608E-01
-
-X( 1) = ( -1.86041311021499E+00,  1.05177576852084E+01)
-X( 2) = ( -2.86443219873958E-01,  4.50739408959264E-02)
-X( 3) = (  3.04599939349811E+00, -4.95006085510332E+00)
-X( 4) = (  8.85460582640049E-01, -1.68285972002731E-03)
-
-X( 5) = ( -6.55009021878591E-02,  7.73124458101883E-02)
-
-PATH NUMBER =      1102
-
-ARCLEN =  3.49210372488062E+00
-NFE =  281
-IFLAG2 = 41
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.11635453820280E-06
-
-X( 1) = ( -1.13826615169746E+06,  8.16335880800529E+05)
-X( 2) = ( -7.07466691217005E+05, -9.22568005456122E+05)
-X( 3) = (  8.76773691539099E-02,  2.42988001531913E-04)
-X( 4) = (  9.14115548909928E-01, -1.13768428714007E-03)
-
-X( 5) = (  9.80090360918760E-07,  3.10524303787942E-07)
-
-PATH NUMBER =      1103
-
-ARCLEN =  5.28904992331318E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999930568611E-01
-
-X( 1) = ( -9.42465333777282E+00,  2.66861315080896E+00)
-X( 2) = ( -9.81916512018746E-01, -1.11870742198306E+01)
-X( 3) = ( -1.05311086952139E-01,  2.13698461010228E-01)
-X( 4) = (  8.80785340797005E-01,  1.13645684410662E-02)
-
-X( 5) = (  2.31177985654145E-01, -9.73765395481202E-02)
-
-PATH NUMBER =      1104
-
-ARCLEN =  2.07401047005826E+00
-NFE =  201
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.83739827000330E-06
-
-X( 1) = (  6.61166415488091E+05, -6.55305323874475E+05)
-X( 2) = ( -2.05201724098838E+00,  1.64399656843875E-02)
-X( 3) = (  8.55361885332227E+05,  1.39661541560924E+05)
-X( 4) = (  6.31536807384537E-01, -4.33742176296499E-04)
-
-X( 5) = ( -4.30052700785163E-07, -2.75410813821051E-07)
-
-PATH NUMBER =      1105
-
-ARCLEN =  1.61949580442964E+00
-NFE =  207
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.22984667021215E-07
-
-X( 1) = ( -2.35783910798661E+06, -1.79242616479250E+06)
-X( 2) = ( -4.15368451949423E-02, -1.98757128972546E-01)
-X( 3) = ( -3.77023556982561E+06, -1.01287187378638E+06)
-X( 4) = (  9.54277418326334E-01,  5.75410024596216E-02)
-
-X( 5) = (  1.03451355876904E-07, -2.34794314454812E-08)
-
-PATH NUMBER =      1106
-
-ARCLEN =  1.37651956573490E+00
-NFE =  314
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99654093249283E-01
-
-X( 1) = ( -3.97471283705092E-01, -1.59063708527953E+00)
-X( 2) = (  2.62716186313025E-03, -8.48721491566914E-02)
-X( 3) = ( -1.13562846927110E+00, -6.02669702193945E-01)
-X( 4) = (  1.01170174371207E+00, -2.61083831858631E-03)
-
-X( 5) = (  1.99180578369268E-01, -1.23804189314547E-01)
-
-PATH NUMBER =      1107
-
-ARCLEN =  2.24912581571454E+00
-NFE =  209
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.37628149930932E-07
-
-X( 1) = ( -7.26230257508115E+06, -7.66467596547283E+06)
-X( 2) = (  4.87280780661748E-01, -2.64946355377359E-01)
-X( 3) = (  7.45062738200646E+05, -2.49451599737450E+06)
-X( 4) = (  2.00319813641679E+07,  1.68235568739310E+07)
-
-X( 5) = (  1.33202181272572E-08, -3.62475540477067E-08)
-
-PATH NUMBER =      1108
-
-ARCLEN =  1.87102743531175E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999563504002E-01
-
-X( 1) = (  6.24302583416022E-01, -3.22760823498168E-01)
-X( 2) = (  5.86535484623779E-02, -6.96318026185825E-02)
-X( 3) = ( -1.21305456856386E+00, -2.22284403428991E+00)
-X( 4) = (  9.72780842291354E-01,  2.72506241163658E-02)
-
-X( 5) = (  1.22535052090498E-01, -2.32087828615505E-01)
-
-PATH NUMBER =      1109
-
-ARCLEN =  1.82807986407495E+00
-NFE =  203
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.97678973944812E-08
-
-X( 1) = (  8.82728672198680E+06,  1.91527161013972E+08)
-X( 2) = (  5.49760832413113E-01,  2.82048840252235E-01)
-X( 3) = (  1.23004830479728E+08,  1.53089462582047E+08)
-X( 4) = (  2.09577333917291E+07, -4.50448620922075E+08)
-
-X( 5) = ( -1.64208768219272E-10,  1.81100749110583E-09)
-
-PATH NUMBER =      1110
-
-ARCLEN =  1.75687019099633E+00
-NFE =  325
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98238527548822E-01
-
-X( 1) = ( -1.59466741859540E-01,  4.05932608257321E-02)
-X( 2) = ( -8.74361696814150E-03,  2.84741586827053E-01)
-X( 3) = (  2.50008780893273E-01, -3.42047971483704E-02)
-X( 4) = (  1.00816462492247E+00, -7.30421945228782E-03)
-
-X( 5) = (  7.24186498392368E-01,  6.45279008389620E-01)
-
-PATH NUMBER =      1111
-
-ARCLEN =  1.81385797464602E+00
-NFE =  468
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98821462691980E-01
-
-X( 1) = ( -4.78710047132577E-01,  2.85218739241898E-01)
-X( 2) = ( -2.88978176799537E-01,  2.27632749608951E-01)
-X( 3) = (  6.99773749234740E-01,  1.72868241673440E-01)
-X( 4) = (  9.53344078286566E-01, -1.35208440904454E-02)
-
-X( 5) = (  3.37565227721534E-01,  6.66325393258648E-01)
-
-PATH NUMBER =      1112
-
-ARCLEN =  4.06685728083801E+00
-NFE =  413
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998064568879E-01
-
-X( 1) = ( -4.79307797327653E-01,  1.94747260547732E+00)
-X( 2) = ( -1.22701193347332E-01, -1.46982542316419E-01)
-X( 3) = (  3.41450930374831E+00, -7.35304325108552E-01)
-X( 4) = (  9.56924789404488E-01, -1.09835004021775E-02)
-
-X( 5) = ( -1.99071817870559E-01,  7.43457021322316E-02)
-
-PATH NUMBER =      1113
-
-ARCLEN =  3.81150768093441E+00
-NFE =  426
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999989041E-01
-
-X( 1) = (  3.14371739472076E+00,  1.10469488695861E+01)
-X( 2) = (  1.85287934683675E-02,  7.71013572409598E-02)
-X( 3) = (  8.00561315899747E-01, -5.16415113906239E-01)
-X( 4) = (  9.75367715425846E-01,  2.32559216871602E-02)
-
-X( 5) = ( -4.18802459268843E-02,  4.75825142506559E-02)
-
-PATH NUMBER =      1114
-
-ARCLEN =  1.70929336203786E+00
-NFE =  200
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999725E-01
-
-X( 1) = ( -2.07419247507473E+02,  6.96282800216418E+01)
-X( 2) = ( -1.13061651495593E+02,  4.31137839494285E+02)
-X( 3) = (  4.47492632711425E-02,  8.97767739645296E-03)
-X( 4) = (  1.04446187903473E+00,  7.86550163697795E-03)
-
-X( 5) = (  9.55130265447637E-04,  7.48931678848194E-04)
-
-PATH NUMBER =      1115
-
-ARCLEN =  2.64084225378425E+00
-NFE =  273
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999992E-01
-
-X( 1) = (  1.95634630018044E+01, -5.75275059974059E+01)
-X( 2) = ( -2.36593614462667E+00,  3.75421244553504E-01)
-X( 3) = ( -3.14349141368039E-01, -4.31140323049155E-02)
-X( 4) = (  8.73845586313455E-01, -5.47758401150879E-03)
-
-X( 5) = (  1.50357180191625E-03, -1.16736325565593E-02)
-
-PATH NUMBER =      1116
-
-ARCLEN =  2.52704732616327E+00
-NFE =  356
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999989712739E-01
-
-X( 1) = (  9.38983831984862E+00, -5.95748619379302E+00)
-X( 2) = (  1.56562784401892E+00, -6.02590180953985E+00)
-X( 3) = ( -1.24965159708996E-03, -6.46036891707424E-03)
-X( 4) = (  1.00409215545130E+00, -8.10101542527822E-03)
-
-X( 5) = ( -2.95158120600023E-02, -3.57669794416116E-02)
-
-PATH NUMBER =      1117
-
-ARCLEN =  1.52203667296721E+00
-NFE =  166
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.93137595903361E-11
-
-X( 1) = (  1.01423592491492E+11, -1.02205380879589E+11)
-X( 2) = (  3.17976658661226E-01, -7.18556948049248E-01)
-X( 3) = ( -1.17624134871354E+11, -2.24582954155051E+11)
-X( 4) = (  1.44287379596944E+11,  2.54708397305807E+11)
-
-X( 5) = (  1.94918408670530E-14, -1.58589189957342E-12)
-
-PATH NUMBER =      1118
-
-ARCLEN =  1.64552688514990E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98849953984226E-01
-
-X( 1) = (  1.18777850276486E-02,  2.56507860975869E-02)
-X( 2) = (  4.94485270508306E-01, -8.70680147255286E-03)
-X( 3) = ( -7.19338541016342E-01, -5.53156250428426E-01)
-X( 4) = (  8.07290860944542E-01,  6.85035666495634E-03)
-
-X( 5) = (  8.30414624873831E-01,  9.76746139735702E-02)
-
-PATH NUMBER =      1119
-
-ARCLEN =  3.04488773834700E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99883606432103E-01
-
-X( 1) = (  1.08979062740159E-01,  6.76518514836983E-01)
-X( 2) = (  3.32435470398263E-01,  1.13053235652509E-01)
-X( 3) = ( -4.01690331417261E-01, -7.47480211609404E-01)
-X( 4) = (  8.07102667897604E-01, -2.35795548580291E-02)
-
-X( 5) = (  8.06201194713893E-01,  9.24259194187135E-01)
-
-PATH NUMBER =      1120
-
-ARCLEN =  1.77828639287957E+00
-NFE =  358
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95427894448612E-01
-
-X( 1) = ( -6.27921306763936E-01,  5.77384319703231E-01)
-X( 2) = ( -5.31414309462463E-01,  8.82689130464575E-02)
-X( 3) = (  6.97458771219191E-01,  2.10012821727528E-01)
-X( 4) = (  7.38663475617877E-01, -1.35986645223210E-01)
-
-X( 5) = (  2.57631569083612E-01,  5.24773317810520E-01)
-
-PATH NUMBER =      1121
-
-ARCLEN =  2.30422208788358E+00
-NFE =  353
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99954202194318E-01
-
-X( 1) = ( -2.00441850631494E+00,  1.04681276747015E+00)
-X( 2) = ( -1.44610590434289E+00, -1.52738598825915E+00)
-X( 3) = (  5.68389912887456E-01,  1.70705557109231E-01)
-X( 4) = (  5.90787300292779E-01, -2.05127286899231E-01)
-
-X( 5) = (  4.28984650145148E-01,  1.69010401597350E-01)
-
-PATH NUMBER =      1122
-
-ARCLEN =  1.43391969942252E+00
-NFE =   93
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.00162318622708E-14
-
-X( 1) = ( -4.57857675887473E+13,  3.46368814226205E+13)
-X( 2) = ( -4.93913094820948E+13,  1.21843105305047E+14)
-X( 3) = (  5.94234163779842E-01, -1.88154866079927E-01)
-X( 4) = (  4.87248419195142E+13,  5.93287049973799E+12)
-
-X( 5) = (  3.91348195169505E-15,  2.43257020429710E-15)
-
-PATH NUMBER =      1123
-
-ARCLEN =  3.91573892181287E+00
-NFE =  491
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.41751074338154E-06
-
-X( 1) = (  3.76687865533325E+00,  2.02781025095781E+00)
-X( 2) = ( -5.33447500397721E+06, -5.30017898269640E+06)
-X( 3) = (  1.13825643026527E+06, -5.17035062193249E+05)
-X( 4) = ( -7.66786123055377E-02,  2.73858596775831E-02)
-
-X( 5) = ( -7.29249010134113E-09, -1.03910536812014E-07)
-
-PATH NUMBER =      1124
-
-ARCLEN =  1.62687739325748E+00
-NFE =  183
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.98646217889293E-08
-
-X( 1) = ( -1.41929417612010E+06,  6.05943433420972E+06)
-X( 2) = (  1.67299786855727E-02, -1.35477617935894E-01)
-X( 3) = (  1.22322301126175E+07, -7.86610360222482E+05)
-X( 4) = (  9.73493222580924E-01,  6.37418194653798E-02)
-
-X( 5) = ( -4.85011109822690E-08,  1.73207757069374E-08)
-
-PATH NUMBER =      1125
-
-ARCLEN =  4.09164214499541E+00
-NFE =  244
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.70061833914719E-08
-
-X( 1) = (  1.08281690367162E-01,  4.80246168991477E-03)
-X( 2) = ( -5.63157383548639E+07,  7.86280835815749E+07)
-X( 3) = (  1.01492206270551E+08,  7.86940875757872E+07)
-X( 4) = (  9.04536909618816E-01, -8.91135008097453E-03)
-
-X( 5) = ( -1.89642101089578E-09,  7.18651415600961E-09)
-
-PATH NUMBER =      1126
-
-ARCLEN =  1.63962525479351E+00
-NFE =  377
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99288459524589E-01
-
-X( 1) = ( -1.66973319017154E-01, -1.86962137479765E-01)
-X( 2) = (  6.46429401590129E-01, -4.49723209842918E-01)
-X( 3) = ( -1.08566966381453E+00, -2.66750285265704E-01)
-X( 4) = (  7.89130088354851E-01,  5.66649778765415E-02)
-
-X( 5) = (  6.57513216188758E-01,  4.30525269789353E-02)
-
-PATH NUMBER =      1127
-
-ARCLEN =  4.16595160933877E+00
-NFE =  369
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99759736959437E-01
-
-X( 1) = (  3.03110440695848E-01, -1.69615061081845E-01)
-X( 2) = (  4.99243659760350E-01, -6.17289335670903E-01)
-X( 3) = ( -4.91891207790408E-01,  6.42671122793238E-01)
-X( 4) = (  1.01028234878116E+00,  2.48089120264819E-01)
-
-X( 5) = (  1.25486904626849E-02,  1.57340181946822E+00)
-
-PATH NUMBER =      1128
-
-ARCLEN =  1.78108045161471E+00
-NFE =  139
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.23507377196842E-13
-
-X( 1) = (  5.04404345137667E-01, -8.40781684575487E-03)
-X( 2) = ( -5.14307271040974E+11, -5.21364333210535E+11)
-X( 3) = (  6.79869310591496E+11, -7.14318747628904E+11)
-X( 4) = ( -1.18445057890223E+12,  1.17698477686623E+12)
-
-X( 5) = ( -3.17499715754566E-13, -2.82547748219064E-13)
-
-PATH NUMBER =      1129
-
-ARCLEN =  2.90793824246603E+00
-NFE =  221
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.44635293382342E-11
-
-X( 1) = (  5.02132017922544E-01,  1.05872555518781E-02)
-X( 2) = ( -8.58828241380044E+09,  3.09879397653637E+09)
-X( 3) = ( -7.80518561135773E+08,  1.59330129655359E+09)
-X( 4) = (  2.31980999863358E+09, -5.45613181470930E+09)
-
-X( 5) = (  6.80693827042125E-11, -5.46221368916827E-12)
-
-PATH NUMBER =      1130
-
-ARCLEN =  1.47309198630019E+00
-NFE =  124
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.44201759461914E-14
-
-X( 1) = ( -1.82042537643704E+11,  9.37772504605136E+11)
-X( 2) = ( -5.52954050998301E+11,  2.36690887189664E+12)
-X( 3) = (  4.99290087246932E-01,  3.34283700934370E-03)
-X( 4) = (  1.43944375011170E+12, -1.36083674253441E+11)
-
-X( 5) = (  2.19219987215163E-13,  2.04175868920298E-13)
-
-PATH NUMBER =      1131
-
-ARCLEN =  3.53132920018050E+00
-NFE =  376
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999985E-01
-
-X( 1) = (  4.46526116597531E+01, -9.00661326116345E+01)
-X( 2) = (  7.85463335336922E+02,  2.96718524366979E+02)
-X( 3) = (  1.34984765398703E-01, -2.77337237436176E-02)
-X( 4) = (  9.18768769873263E-01, -2.91747270710609E-03)
-
-X( 5) = ( -6.48544914308875E-04,  9.44731256200764E-04)
-
-PATH NUMBER =      1132
-
-ARCLEN =  2.65059618619520E+00
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999943E-01
-
-X( 1) = (  9.55970807944432E-01,  1.68478136293158E-02)
-X( 2) = (  1.57048796244309E-02, -1.63519176842134E-01)
-X( 3) = ( -9.38990202659337E+01,  4.16081225494335E+01)
-X( 4) = (  1.50543639492046E+02, -5.11274932882531E+01)
-
-X( 5) = (  5.18455920174960E-03, -8.80239010937867E-05)
-
-PATH NUMBER =      1133
-
-ARCLEN =  1.80217171467261E+00
-NFE =  328
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996953611322E-01
-
-X( 1) = ( -2.49303059118903E-01,  4.75840693426556E-01)
-X( 2) = (  1.99858609085682E+00,  2.60320659029860E+00)
-X( 3) = (  7.87958622688549E-01,  2.92300203187187E-01)
-X( 4) = (  4.67578482414799E-01, -5.38633990124294E-02)
-
-X( 5) = ( -1.00540352987038E-02,  1.78042848859804E-01)
-
-PATH NUMBER =      1134
-
-ARCLEN =  2.24390307743095E+00
-NFE =  312
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96775522805843E-01
-
-X( 1) = ( -3.34344452656524E-01, -5.39161060220151E-01)
-X( 2) = (  9.62631158102321E-01, -4.04426091482872E-01)
-X( 3) = ( -9.38132133110333E-01, -4.88417945374554E-01)
-X( 4) = (  5.92958479927176E-01,  5.25357113303394E-02)
-
-X( 5) = (  6.88280388604159E-01, -8.68334847261081E-02)
-
-PATH NUMBER =      1135
-
-ARCLEN =  3.23737962545604E+00
-NFE =  468
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98941789220625E-01
-
-X( 1) = (  7.12511570035156E-01,  4.92605512190397E-02)
-X( 2) = ( -2.34263329908704E-02, -5.10147215328891E-01)
-X( 3) = ( -8.26583435040670E-01, -4.62407399490356E-01)
-X( 4) = (  3.00823359226060E-01,  1.22075732487751E-01)
-
-X( 5) = (  5.62808873391034E-01, -1.18007694946443E+00)
-
-PATH NUMBER =      1136
-
-ARCLEN =  5.15653357235545E+00
-NFE =  320
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99813401510768E-01
-
-X( 1) = (  7.01219399566047E-02,  7.50147088227473E-02)
-X( 2) = (  6.26019949296589E-01, -3.90472787008659E-01)
-X( 3) = ( -2.09538222782920E-01, -9.90507599555566E-01)
-X( 4) = (  6.13276922700954E-01,  1.29513985997303E-01)
-
-X( 5) = ( -2.51437233599852E-01, -1.52271459653731E+00)
-
-PATH NUMBER =      1137
-
-ARCLEN =  3.45576829235753E+00
-NFE =  326
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998174232323E-01
-
-X( 1) = (  7.54683030794282E-01, -4.50103408636185E-03)
-X( 2) = ( -6.83593703840999E-02, -6.13728883354417E-02)
-X( 3) = ( -1.62428317448748E+00, -1.25766358643814E+00)
-X( 4) = (  1.16402148639780E+00, -9.88575621760598E-02)
-
-X( 5) = (  2.66925409978780E-01, -2.26461119958058E-01)
-
-PATH NUMBER =      1138
-
-ARCLEN =  7.17701044610796E+00
-NFE =  237
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999849E-01
-
-X( 1) = (  9.41641365088288E-01, -5.52461336456814E-03)
-X( 2) = ( -1.41820804411592E-01, -6.36266020336173E-02)
-X( 3) = ( -5.82001410848774E+01, -4.97929879266170E+01)
-X( 4) = (  8.84795840682618E+01,  9.30336569841904E+01)
-
-X( 5) = (  2.58631386224460E-03, -6.25649396176154E-03)
-
-PATH NUMBER =      1139
-
-ARCLEN =  3.99154355694103E+00
-NFE =  321
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99810562016535E-01
-
-X( 1) = (  8.99441356078326E-01, -1.46541352864465E-04)
-X( 2) = (  6.40252904281461E-01,  1.28889893852206E+00)
-X( 3) = ( -3.28753795974104E-01, -1.83555137467799E-02)
-X( 4) = (  6.23060987931021E-01, -8.72752527986491E-01)
-
-X( 5) = (  1.77850216038344E-01,  4.44274953229779E-01)
-
-PATH NUMBER =      1140
-
-ARCLEN =  1.93149246877943E+00
-NFE =  137
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.33331843616998E-13
-
-X( 1) = (  1.69973575884422E+13, -5.66601492307037E+12)
-X( 2) = (  3.74657088544331E+13,  1.55815814297846E+13)
-X( 3) = (  5.34993050173913E-01, -4.79116538954615E-02)
-X( 4) = (  6.71078332605707E+11, -2.20967986799649E+13)
-
-X( 5) = ( -1.59575315201305E-14,  1.74915962790345E-14)
-
-PATH NUMBER =      1141
-
-ARCLEN =  4.06217639319532E+00
-NFE =  292
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.14912647526421E-07
-
-X( 1) = (  8.80684376124400E+05,  1.16692433638291E+06)
-X( 2) = ( -7.70896611667745E+06,  8.94910938023614E+06)
-X( 3) = (  1.81948043336189E+00, -2.69706661607617E-01)
-X( 4) = (  2.25567489369303E-01, -7.79271777089748E-02)
-
-X( 5) = (  7.78933107472256E-08,  2.15351254692782E-08)
-
-PATH NUMBER =      1142
-
-ARCLEN =  2.04012142169288E+00
-NFE =  306
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999969E-01
-
-X( 1) = ( -1.74662250420291E+02,  4.59533750001589E+01)
-X( 2) = ( -8.54666849991403E+02,  8.76764606565948E+02)
-X( 3) = (  9.21997574837710E-01,  1.34223815517165E-01)
-X( 4) = (  1.35117462941903E-01, -9.83412645875919E-02)
-
-X( 5) = (  5.94390986398833E-04,  1.12870864067659E-04)
-
-PATH NUMBER =      1143
-
-ARCLEN =  2.22625037452115E+00
-NFE =  277
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999961E-01
-
-X( 1) = (  2.92395540303803E+01,  1.16165211846048E+01)
-X( 2) = (  4.77337512852144E+02,  1.08435620710781E+02)
-X( 3) = (  8.96023491308018E-01, -1.42210832201482E-03)
-X( 4) = ( -1.65075973410191E-01, -5.22755604772010E-02)
-
-X( 5) = ( -1.08731042869478E-03,  1.25424137809958E-03)
-
-PATH NUMBER =      1144
-
-ARCLEN =  2.32067437566025E+00
-NFE =  246
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999994E-01
-
-X( 1) = (  1.17811353663461E-01,  4.29673195913751E-03)
-X( 2) = (  8.73696034585682E+02, -3.08383705305006E+02)
-X( 3) = (  1.01089678281272E+02, -6.38432534340271E+01)
-X( 4) = (  9.20372640793801E-01,  1.20237048664321E-03)
-
-X( 5) = ( -8.16823730317602E-04,  1.99442296389990E-04)
-
-PATH NUMBER =      1145
-
-ARCLEN =  3.36617987264531E+00
-NFE =  249
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.47377701042735E-07
-
-X( 1) = (  6.35366744650610E-01, -5.29889829539559E-03)
-X( 2) = (  1.05459447961904E+06, -2.30702598889404E+06)
-X( 3) = (  1.19569034360898E+05, -3.48595443763032E+05)
-X( 4) = ( -1.03300690262240E+00,  3.22524393210839E-01)
-
-X( 5) = ( -2.53236188475976E-07, -1.59800289751199E-07)
-
-PATH NUMBER =      1146
-
-ARCLEN =  6.03509320568945E+00
-NFE =  256
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999983E-01
-
-X( 1) = (  1.66064931650942E+02, -8.21133149015991E+01)
-X( 2) = ( -9.42990135421068E-03,  8.78119646665102E-02)
-X( 3) = ( -1.71839770568608E+02, -5.24247527506327E+01)
-X( 4) = (  1.01123040252845E+00, -6.66603048115190E-03)
-
-X( 5) = (  1.07287290066272E-03, -3.59184278569752E-03)
-
-PATH NUMBER =      1147
-
-ARCLEN =  2.29603602096491E+01
-NFE =  528
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998693527209E-01
-
-X( 1) = (  2.80483122468284E+00,  2.56373691584786E+00)
-X( 2) = ( -6.57563751816469E-01,  6.33895363883746E-02)
-X( 3) = ( -1.02588516873283E+00, -2.10629293547557E+00)
-X( 4) = (  8.93904124549282E-01,  2.61126280944550E-02)
-
-X( 5) = ( -3.62281950989140E-01, -2.02499411224354E-01)
-
-PATH NUMBER =      1148
-
-ARCLEN =  3.68701287286349E+01
-NFE =  492
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99936374276406E-01
-
-X( 1) = (  1.44226233565895E+00,  7.53860689285531E-01)
-X( 2) = ( -5.91088168284489E-01,  1.13806543283256E+00)
-X( 3) = ( -4.44888030714564E-01, -3.67763384336654E-01)
-X( 4) = (  8.65498127785703E-01, -6.96409357217928E-02)
-
-X( 5) = (  6.59152950970858E-01,  9.48142110719356E-01)
-
-PATH NUMBER =      1149
-
-ARCLEN =  8.58646471645832E+00
-NFE =  261
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.14048581689085E-09
-
-X( 1) = ( -1.91106944831139E+10, -2.81852590852739E+10)
-X( 2) = (  1.11432907630700E+11,  7.64057898772745E+10)
-X( 3) = (  4.47109268159453E-01,  5.33975230124093E-02)
-X( 4) = ( -2.87686327665240E+10,  3.71739142465261E+10)
-
-X( 5) = ( -1.68029227142451E-12,  7.11199155123410E-12)
-
-PATH NUMBER =      1150
-
-ARCLEN =  4.77789171734743E+00
-NFE =  274
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999987E-01
-
-X( 1) = (  3.16182347714762E+02,  1.76030619338287E+02)
-X( 2) = ( -5.49418452427333E+02,  6.15168066904143E+02)
-X( 3) = (  9.12317428928975E-01,  1.31380243371419E-03)
-X( 4) = (  9.18444994341134E-02,  1.36881934990423E-02)
-
-X( 5) = (  1.84751578443048E-03,  7.65723266381279E-04)
-
-PATH NUMBER =      1151
-
-ARCLEN =  2.41042535084576E+00
-NFE =  220
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.37083486124786E-12
-
-X( 1) = (  1.98213553964076E+10,  7.59407528282457E+10)
-X( 2) = ( -4.80210844976032E+10,  5.41300231320817E+11)
-X( 3) = (  4.95330711892225E-01, -6.68247975412950E-03)
-X( 4) = (  9.08398182177564E+10,  7.07478833678846E+10)
-
-X( 5) = (  1.03138979019694E-12,  1.31663094055795E-12)
-
-PATH NUMBER =      1152
-
-ARCLEN =  2.50734905891999E+00
-NFE =  327
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999995956E-01
-
-X( 1) = (  5.01066917228506E-01, -2.59144319449087E-01)
-X( 2) = (  1.68605781716307E+00, -7.09125199012532E+01)
-X( 3) = (  1.73174199194596E+00, -5.65177113419251E+00)
-X( 4) = (  4.84380796971099E-01,  2.08542449024564E-01)
-
-X( 5) = ( -6.89501720112821E-03, -8.60473355128680E-03)
-
-PATH NUMBER =      1153
-
-ARCLEN =  4.15705945776160E+00
-NFE =  212
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.32318402008171E-06
-
-X( 1) = (  9.14944568300231E-01,  4.15782533223058E-03)
-X( 2) = (  1.31105911978023E+06, -1.91477262513284E+06)
-X( 3) = ( -3.80602017852422E+05, -1.14034860707911E+06)
-X( 4) = (  1.15498259721073E-01, -1.82390726441497E-02)
-
-X( 5) = ( -2.17011318733116E-07, -2.45086119653518E-07)
-
-PATH NUMBER =      1154
-
-ARCLEN =  6.79222832977733E+00
-NFE =  205
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.00754144890809E-08
-
-X( 1) = ( -1.86337379875527E+07, -2.37884497951151E+07)
-X( 2) = (  6.41895436717908E-01,  5.30856616794542E-02)
-X( 3) = ( -4.60558465464701E+06,  4.46292544019956E+07)
-X( 4) = ( -4.82524214088500E-02,  1.76720895133504E-01)
-
-X( 5) = (  1.19301253261083E-08,  1.24785412727695E-08)
-
-PATH NUMBER =      1155
-
-ARCLEN =  5.76320953073411E+00
-NFE =  258
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999980E-01
-
-X( 1) = ( -5.84328812778374E+01,  7.87393800261105E+01)
-X( 2) = (  1.06249558638744E-01,  2.51649543023369E-01)
-X( 3) = (  7.61717419056989E+01, -8.99318291566228E+01)
-X( 4) = (  8.78438474233478E-01, -6.92864032510011E-02)
-
-X( 5) = ( -1.46821955725948E-02,  8.70572885380997E-04)
-
-PATH NUMBER =      1156
-
-ARCLEN =  8.09210899947694E+00
-NFE =  231
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.36960336413076E-06
-
-X( 1) = ( -6.60456072580203E+03,  5.93183720954655E+05)
-X( 2) = ( -2.33886425141680E+00,  2.37853773549843E-02)
-X( 3) = (  3.11337356543487E+03, -7.51685646697243E+05)
-X( 4) = (  6.30466584619377E-01,  1.83984915441064E-05)
-
-X( 5) = ( -1.78384879039910E-06, -1.81170622906985E-06)
-
-PATH NUMBER =      1157
-
-ARCLEN =  2.41276617211966E+00
-NFE =  312
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99332836206206E-01
-
-X( 1) = ( -1.00001552797618E+00,  1.20672832101811E+00)
-X( 2) = ( -1.54503659144446E+00,  1.15779002243709E-01)
-X( 3) = (  6.22951674219220E-01, -1.36885608001717E-01)
-X( 4) = (  6.22040963599687E-01,  2.44369001102852E-01)
-
-X( 5) = (  3.73595026984407E-01,  2.83079917032925E-01)
-
-PATH NUMBER =      1158
-
-ARCLEN =  3.94920139764218E+00
-NFE =  317
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991155372751E-01
-
-X( 1) = ( -2.83254664256148E+00, -3.03880612279444E-01)
-X( 2) = (  4.80523199032384E-01, -2.73690932791552E+00)
-X( 3) = (  5.45140334866189E-01,  1.42717700791779E-01)
-X( 4) = (  5.62831074703082E-01, -3.76858785371029E-01)
-
-X( 5) = (  7.80336561549693E-01, -4.28976075676823E-02)
-
-PATH NUMBER =      1159
-
-ARCLEN =  3.74483969226874E+00
-NFE =  362
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997712322612E-01
-
-X( 1) = (  2.95373161926670E+00,  9.33692055979400E-01)
-X( 2) = (  2.60478375477071E-01,  3.43655200961121E+00)
-X( 3) = (  4.38903593068184E-01, -1.61934920542379E-01)
-X( 4) = (  4.60823825163909E-01,  3.44497988156444E-01)
-
-X( 5) = ( -1.47088063631582E-01,  2.19341400728699E-01)
-
-PATH NUMBER =      1160
-
-ARCLEN =  6.89995150056636E+00
-NFE =  155
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.54044691288243E-13
-
-X( 1) = ( -2.79312685994907E+11, -6.73172867424157E+11)
-X( 2) = (  2.07143834805085E+12, -2.20332518587886E+12)
-X( 3) = (  4.97804575331747E-01, -2.22079894115271E-02)
-X( 4) = (  1.38720665428759E+11, -8.51298281752548E+11)
-
-X( 5) = ( -3.67327641827980E-13, -1.55573579192769E-13)
-
-PATH NUMBER =      1161
-
-ARCLEN =  8.21976910969525E+00
-NFE =  296
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999839E-01
-
-X( 1) = (  3.74955608119586E-01, -5.54155647804256E-02)
-X( 2) = (  1.35155304342036E+03,  8.17208422102308E+01)
-X( 3) = (  1.77381013608677E+00, -6.82125191135652E-01)
-X( 4) = (  2.35330192448447E+02,  7.23171847599614E+00)
-
-X( 5) = ( -5.16294102072129E-04,  4.48218116094279E-04)
-
-PATH NUMBER =      1162
-
-ARCLEN =  9.48144086631288E+00
-NFE =  268
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99931230169661E-01
-
-X( 1) = (  6.46195525432518E-01,  7.01309001691664E-01)
-X( 2) = (  6.00111060432199E-01, -2.85138575056936E-01)
-X( 3) = (  1.48835909001038E-01, -2.00541436878710E+00)
-X( 4) = ( -1.79208551920240E-01, -7.79261862263159E-01)
-
-X( 5) = ( -5.54209170115281E-01, -3.79915290295872E-01)
-
-PATH NUMBER =      1163
-
-ARCLEN =  4.93050900163290E+00
-NFE =  266
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99387122887487E-01
-
-X( 1) = ( -1.28824900180992E-01,  8.49966532181782E-01)
-X( 2) = (  4.50749054854273E-01, -3.77978084636238E-02)
-X( 3) = (  3.79146418892377E-01, -1.02027869990516E+00)
-X( 4) = (  4.54975671058479E-01, -3.08471999916072E-01)
-
-X( 5) = ( -5.95504608718929E-01,  9.47180630748042E-01)
-
-PATH NUMBER =      1164
-
-ARCLEN =  2.96338705699951E+00
-NFE =  360
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99855303595376E-01
-
-X( 1) = ( -1.31266691725017E+00,  4.69461722233393E-01)
-X( 2) = ( -1.66175231363695E-01,  1.37210893901344E-01)
-X( 3) = (  1.41809732838649E+00,  1.51199087364703E-01)
-X( 4) = (  8.87536668045247E-01, -3.76684580977463E-02)
-
-X( 5) = (  1.06355805694034E-01,  5.14477159435311E-01)
-
-PATH NUMBER =      1165
-
-ARCLEN =  3.21951398621438E+00
-NFE =  385
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999992E-01
-
-X( 1) = ( -7.28445936566279E+01, -3.11219080675724E+01)
-X( 2) = ( -3.96121241037316E-01,  3.60017732354268E-02)
-X( 3) = ( -8.49771475342291E+00, -6.56540855748924E+00)
-X( 4) = (  8.77466203308962E-01,  4.14206662356974E-03)
-
-X( 5) = (  8.16765443226317E-03, -4.67808470333565E-04)
-
-PATH NUMBER =      1166
-
-ARCLEN =  4.21773467400897E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99964096302252E-01
-
-X( 1) = ( -2.35341340625993E+00, -2.37413078649105E-01)
-X( 2) = (  2.52024733158390E-01, -1.81327911671439E+00)
-X( 3) = (  8.57636522578464E-01,  1.15715066702001E-01)
-X( 4) = (  3.04294145919710E-01, -2.07906871074629E-01)
-
-X( 5) = (  8.61347718117922E-01,  4.04901346090888E-01)
-
-PATH NUMBER =      1167
-
-ARCLEN =  1.52928370440876E+00
-NFE =  382
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99867974392434E-01
-
-X( 1) = ( -1.67596517889593E+00,  3.22869350108615E-01)
-X( 2) = ( -3.07958574725759E-01, -5.82373108275767E-01)
-X( 3) = (  6.11530207341596E-01,  9.32150708040632E-02)
-X( 4) = (  9.07653666376540E-01, -3.15345992698724E-01)
-
-X( 5) = (  3.94461136966138E-01,  2.58061053733856E-01)
-
-PATH NUMBER =      1168
-
-ARCLEN =  2.20022660428955E+00
-NFE =  205
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.76634661145733E-07
-
-X( 1) = ( -5.75616587213056E+05,  1.05685444990840E+06)
-X( 2) = ( -4.09724520954613E+05,  2.99894345850579E+05)
-X( 3) = (  1.10677287377598E-02, -3.93211920105262E-02)
-X( 4) = (  9.85976736042655E-01,  4.12204089774608E-02)
-
-X( 5) = (  2.33447633252577E-07,  5.13848269593240E-07)
-
-PATH NUMBER =      1169
-
-ARCLEN =  2.35040142560311E+01
-NFE =  313
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.53017527109706E-09
-
-X( 1) = ( -4.69145430667389E+07,  1.98679083282573E+07)
-X( 2) = ( -1.58796286543023E+09, -3.29909723476510E+08)
-X( 3) = (  5.02879734397705E-01, -2.91140659314129E-02)
-X( 4) = ( -2.23136585338471E+08, -2.42681353608682E+07)
-
-X( 5) = (  3.79328349845364E-10, -4.18080922692018E-10)
-
-PATH NUMBER =      1170
-
-ARCLEN =  2.04515294949795E+01
-NFE =  260
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99932615140512E-01
-
-X( 1) = ( -7.79727227847742E-02,  4.55297434976960E-02)
-X( 2) = (  1.22500626462702E+00, -2.80892151211023E-01)
-X( 3) = (  8.69847068862774E-01, -7.23887421170529E-01)
-X( 4) = (  6.16835391811808E-01, -5.67676299902546E-01)
-
-X( 5) = ( -6.20196674751985E-01,  1.81232158726602E-01)
-
-PATH NUMBER =      1171
-
-ARCLEN =  1.64887676944131E+01
-NFE =  439
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988049653933E-01
-
-X( 1) = ( -1.76859642570995E+00, -8.32472462235232E-01)
-X( 2) = (  5.20179699688979E-01, -2.11553442659486E-01)
-X( 3) = (  1.63512225558845E+00,  1.15821349485313E+00)
-X( 4) = (  2.69229061734974E+00,  1.93431605560182E+00)
-
-X( 5) = ( -4.14997294764089E-01,  1.72128557130937E+00)
-
-PATH NUMBER =      1172
-
-ARCLEN =  2.99978256101719E+00
-NFE =  337
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99296510797842E-01
-
-X( 1) = ( -3.39157835792853E-01,  8.52899295104349E-02)
-X( 2) = (  6.06299259755176E-01, -1.07857500077614E-01)
-X( 3) = (  1.27888130044094E-01, -5.43739203823715E-01)
-X( 4) = (  8.06130552878175E-01, -3.09553045913347E-01)
-
-X( 5) = (  1.11808926892517E+00,  1.16683168752000E+00)
-
-PATH NUMBER =      1173
-
-ARCLEN =  9.87612002117883E+00
-NFE =  258
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.76713385481006E-07
-
-X( 1) = ( -2.84282636034015E+06,  1.05752972786592E+07)
-X( 2) = ( -4.33801377904369E-01,  5.33741504816518E-02)
-X( 3) = (  7.53358795629318E+06, -7.44265544944365E+06)
-X( 4) = (  8.14534168113351E-01, -2.00742502592117E-03)
-
-X( 5) = ( -7.36627086442927E-08,  2.54463019222994E-08)
-
-PATH NUMBER =      1174
-
-ARCLEN =  1.57153567921253E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98676930870184E-01
-
-X( 1) = ( -1.02221316550644E+00,  1.02455912304437E+00)
-X( 2) = ( -1.07207582812707E+00,  5.42413052190621E-02)
-X( 3) = (  6.94230904690444E-01, -2.32738093444807E-01)
-X( 4) = (  6.46688029154643E-01,  1.34211866801061E-01)
-
-X( 5) = (  3.98970225646664E-01,  3.75366342740160E-01)
-
-PATH NUMBER =      1175
-
-ARCLEN =  2.83813572281659E+00
-NFE =  349
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.87500724477464E-07
-
-X( 1) = ( -6.68844678103546E+05, -3.86907843073708E+05)
-X( 2) = ( -1.85726555927984E+05, -2.67935355029595E+05)
-X( 3) = (  9.65462287491902E-01,  3.22217263261203E-02)
-X( 4) = (  3.42291108731421E-02, -3.63002267859565E-02)
-
-X( 5) = (  7.90691130131638E-07, -3.84044308387554E-07)
-
-PATH NUMBER =      1176
-
-ARCLEN =  1.76417730915839E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997179469370E-01
-
-X( 1) = ( -1.98297887123362E+00,  1.19211217787000E+00)
-X( 2) = (  1.43848567397765E-01,  5.55272070506538E-01)
-X( 3) = (  1.05790765810803E+00,  4.08337771065393E-01)
-X( 4) = (  5.52999909530686E-01, -1.22108833154606E-02)
-
-X( 5) = (  6.15362463486552E-02,  2.14730034596872E-01)
-
-PATH NUMBER =      1177
-
-ARCLEN =  1.99511145274759E+00
-NFE =  243
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999993917449E-01
-
-X( 1) = ( -7.28624402540982E+00, -1.83681095060459E+01)
-X( 2) = ( -1.10130988147550E+01, -7.47016779509616E+00)
-X( 3) = (  3.09186935884502E-02, -1.84733641815945E-02)
-X( 4) = (  1.03061380163509E+00, -1.53659594560430E-02)
-
-X( 5) = (  1.40679227811119E-02, -1.94553771082652E-02)
-
-PATH NUMBER =      1178
-
-ARCLEN =  4.08513302922469E+00
-NFE =  482
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99987245690597E-01
-
-X( 1) = (  1.17629137017526E+00, -1.90814230246127E+00)
-X( 2) = (  2.59602800407514E+00,  3.73306829194086E-01)
-X( 3) = ( -2.11699040308032E-02, -1.76985617160342E-02)
-X( 4) = (  1.03314108912988E+00,  5.06529203531566E-02)
-
-X( 5) = ( -5.28075457546935E-01, -1.37911726656823E-01)
-
-PATH NUMBER =      1179
-
-ARCLEN =  6.86753932577070E+00
-NFE =  353
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98785230668414E-01
-
-X( 1) = ( -8.57933109380806E-01, -2.61538097711977E-01)
-X( 2) = (  4.18197566311070E-01, -1.20347634398079E+00)
-X( 3) = (  5.51494756759607E-01, -1.49938679168197E-03)
-X( 4) = (  1.15979097637242E+00, -8.14184541948238E-01)
-
-X( 5) = (  2.21934807852483E+00, -1.02764849446296E+00)
-
-PATH NUMBER =      1180
-
-ARCLEN =  3.33640139229700E+00
-NFE =  304
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99616636711757E-01
-
-X( 1) = ( -3.68476447453053E-01, -2.91526275261731E-01)
-X( 2) = (  2.15096952836130E-01, -1.31589841422683E-01)
-X( 3) = (  3.69174938087990E-01, -3.12565992509510E-01)
-X( 4) = (  1.17718795703783E+00,  5.17704308146399E-02)
-
-X( 5) = (  1.33200781489841E+00, -7.46473934702986E-01)
-
-PATH NUMBER =      1181
-
-ARCLEN =  1.98337711148643E+00
-NFE =  417
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98943334216152E-01
-
-X( 1) = ( -2.07754503073766E-01, -2.51310739043311E-01)
-X( 2) = (  3.52009801838466E-01,  1.70091971292533E-01)
-X( 3) = ( -1.07301543613193E-01, -5.70717771936414E-01)
-X( 4) = (  9.50332789326854E-01, -4.89709439679618E-02)
-
-X( 5) = (  8.81908597319884E-01, -1.24864385494285E-01)
-
-PATH NUMBER =      1182
-
-ARCLEN =  3.20509919516554E+00
-NFE =  541
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999751936697E-01
-
-X( 1) = ( -3.88227377803175E+00,  2.20887771915383E+00)
-X( 2) = ( -3.24865119013293E-01,  5.53363498529068E-02)
-X( 3) = (  2.18540566514489E+00, -1.08050941935528E+00)
-X( 4) = (  8.81127363545117E-01,  7.48495636112349E-03)
-
-X( 5) = (  1.11808178416061E-01,  2.27670689738387E-01)
-
-PATH NUMBER =      1183
-
-ARCLEN =  3.97395176880356E+00
-NFE =  585
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999400291882E-01
-
-X( 1) = (  1.26262071259379E+00, -1.81363148560329E+00)
-X( 2) = (  4.10803088637525E-01, -1.14372695843876E+00)
-X( 3) = (  4.76125744880551E-01, -1.00795688469392E-01)
-X( 4) = (  4.93231414967222E-01,  6.60105721271299E-01)
-
-X( 5) = ( -1.33799957849282E-01, -2.04481009723858E-01)
-
-PATH NUMBER =      1184
-
-ARCLEN =  2.18694434658306E+00
-NFE =  445
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999977404981E-01
-
-X( 1) = ( -3.82270794073630E+00, -7.14363449630647E+00)
-X( 2) = ( -5.09316385741119E+00, -2.73975024809140E+00)
-X( 3) = (  5.43965985011196E-01, -2.71567544788580E-01)
-X( 4) = (  5.41709103279894E-01,  2.07572671421207E-01)
-
-X( 5) = (  3.79101207584077E-02, -4.45763799312826E-02)
-
-PATH NUMBER =      1185
-
-ARCLEN =  2.38370127218301E+00
-NFE =  405
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99573185252555E-01
-
-X( 1) = ( -1.04517251924122E+00,  3.51758392907877E-02)
-X( 2) = ( -9.37469262169039E-01, -9.37794873150072E-01)
-X( 3) = (  6.44119137846750E-01,  1.49141505958467E-01)
-X( 4) = (  8.80795192626522E-01, -1.52067646210573E-01)
-
-X( 5) = (  7.29618344527362E-01, -1.67624271106016E-01)
-
-PATH NUMBER =      1186
-
-ARCLEN =  2.07303642148574E+00
-NFE =  155
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.82471145041159E-09
-
-X( 1) = ( -4.50265721211457E+08, -2.89114545507806E+08)
-X( 2) = ( -5.34343134919586E+08, -5.03070738104129E+08)
-X( 3) = ( -4.84750755811902E-01, -1.26057274894907E-01)
-X( 4) = (  7.53396027802513E-01, -2.31760430764720E-02)
-
-X( 5) = (  5.09945192599419E-10, -5.93265487734349E-10)
-
-PATH NUMBER =      1187
-
-ARCLEN =  2.27395077126812E+00
-NFE =  359
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98974662680214E-01
-
-X( 1) = ( -5.11103552154814E-01, -5.49230405569058E-01)
-X( 2) = (  6.43990976878304E-01, -3.50632423940854E-01)
-X( 3) = ( -3.58991021322785E-01,  1.76899978511458E-02)
-X( 4) = (  8.38226964085247E-01,  6.72540304508766E-02)
-
-X( 5) = (  7.91405988291574E-01,  1.52873070324131E-01)
-
-PATH NUMBER =      1188
-
-ARCLEN =  1.71101473373396E+00
-NFE =  566
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99029186808970E-01
-
-X( 1) = ( -2.42542707885249E-01, -7.47843291690416E-01)
-X( 2) = (  3.28828856262307E-01, -5.25094388572251E-01)
-X( 3) = ( -6.14270076896126E-02, -1.48431517187360E-01)
-X( 4) = (  1.02762395195439E+00, -2.96678418910818E-02)
-
-X( 5) = (  5.67921295779637E-01, -5.87313689688936E-01)
-
-PATH NUMBER =      1189
-
-ARCLEN =  1.22958458647870E+00
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.78704870588649E-01
-
-X( 1) = ( -2.08952200968842E-01, -5.84576375070481E-01)
-X( 2) = (  2.72715451325669E-01, -2.11037256504088E-01)
-X( 3) = ( -7.05923260880599E-01, -2.13444970045318E-02)
-X( 4) = (  8.97129370978097E-01,  5.88586523652136E-03)
-
-X( 5) = (  5.43058022722360E-01, -5.19550085612237E-02)
-
-PATH NUMBER =      1190
-
-ARCLEN =  2.97629205727935E+00
-NFE =  316
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99849766452940E-01
-
-X( 1) = ( -1.09263241663349E-01, -1.49862623795091E-02)
-X( 2) = (  2.55801175919173E-01, -1.09308163305993E-01)
-X( 3) = (  7.23057789187102E-02, -7.90088146404699E-01)
-X( 4) = (  8.93220848637497E-01,  3.86642824504372E-02)
-
-X( 5) = (  8.96800962870468E-01, -1.11023367874163E+00)
-
-PATH NUMBER =      1191
-
-ARCLEN =  3.09965831958442E+00
-NFE =  409
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99514761897525E-01
-
-X( 1) = ( -2.43247177761572E-01,  4.90953036065938E-01)
-X( 2) = ( -7.23752020943459E-02,  4.02471121417599E-01)
-X( 3) = (  4.61691852321208E-01, -7.86458880903726E-01)
-X( 4) = (  9.20625661769492E-01,  2.16596803742038E-02)
-
-X( 5) = (  1.34473459702911E+00,  9.64021540265864E-01)
-
-PATH NUMBER =      1192
-
-ARCLEN =  1.31763351050428E+00
-NFE =  350
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98253836369249E-01
-
-X( 1) = ( -7.95907027434739E-01,  6.22843961853628E-01)
-X( 2) = ( -6.94508971165606E-01,  3.28084366825527E-01)
-X( 3) = (  6.44965247934926E-01, -1.31944441958946E-01)
-X( 4) = (  9.22387790124992E-01,  1.13537681343880E-01)
-
-X( 5) = (  4.32288965892800E-01,  3.89197500625562E-01)
-
-PATH NUMBER =      1193
-
-ARCLEN =  1.36865634052668E+00
-NFE =  242
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.72424555416808E-01
-
-X( 1) = ( -1.00084276588950E+00,  5.12878904881268E-01)
-X( 2) = ( -8.72455444184461E-01,  3.90546182294810E-01)
-X( 3) = (  6.24085119280016E-01,  3.77851244906435E-02)
-X( 4) = (  7.74200561881256E-01,  3.30917048283337E-02)
-
-X( 5) = (  3.47960125551705E-01,  2.63816480486387E-01)
-
-PATH NUMBER =      1194
-
-ARCLEN =  4.58996573179319E+01
-NFE =  356
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.47287116286490E-12
-
-X( 1) = (  8.67078820041084E+11,  5.77454424904407E+12)
-X( 2) = ( -9.14835923214315E+12,  2.54547658807982E+12)
-X( 3) = (  4.88065630382848E+12, -2.38000993772152E+12)
-X( 4) = (  5.05380229795449E-01, -7.07875878478863E-03)
-
-X( 5) = ( -2.86596728337266E-13, -6.03280446431764E-13)
-
-PATH NUMBER =      1195
-
-ARCLEN =  2.25011995172330E+00
-NFE =  279
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998879675E-01
-
-X( 1) = ( -6.94832677727787E+00, -1.30384616385235E+01)
-X( 2) = ( -3.82343499577045E-01, -3.56474453665234E-02)
-X( 3) = ( -8.50513571478831E-01,  9.05023224596170E+00)
-X( 4) = (  8.78386342411386E-01, -3.01732703206240E-03)
-
-X( 5) = (  5.70046561436566E-02,  6.26822338368614E-05)
-
-PATH NUMBER =      1196
-
-ARCLEN =  1.90039673124751E+00
-NFE =  280
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999788449738E-01
-
-X( 1) = ( -4.24018920739732E+00, -7.38905682188083E+00)
-X( 2) = ( -9.79658239722040E+00, -3.90289164408254E+00)
-X( 3) = ( -4.82651939074588E-02,  3.73395661960155E-02)
-X( 4) = (  9.59293022977482E-01,  1.99289056681408E-02)
-
-X( 5) = (  2.86817956633712E-02, -3.09298241142530E-02)
-
-PATH NUMBER =      1197
-
-ARCLEN =  1.80146426601885E+00
-NFE =  180
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.34042413056254E-07
-
-X( 1) = ( -9.90947347321552E+05,  4.27992358774252E+05)
-X( 2) = (  3.33148504746704E-02, -1.79165470453221E-01)
-X( 3) = ( -1.61036444753260E+05,  2.28019506261759E+06)
-X( 4) = (  9.36671251289939E-01,  4.02989388689688E-02)
-
-X( 5) = (  5.68435503780281E-08,  2.22256201451139E-07)
-
-PATH NUMBER =      1198
-
-ARCLEN =  4.12179587217577E+00
-NFE =  283
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.55494186944610E-11
-
-X( 1) = (  5.04989314036527E-01,  2.93798718482988E-03)
-X( 2) = (  2.55093865006773E+10,  5.23392443937211E+09)
-X( 3) = (  4.24511257543063E+09, -8.39363167069804E+09)
-X( 4) = (  3.57329504132332E+09,  3.44333351535249E+09)
-
-X( 5) = ( -3.48725567194709E-11,  1.27376756603285E-11)
-
-PATH NUMBER =      1199
-
-ARCLEN =  7.01643238928074E+00
-NFE =  593
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95248452911812E-01
-
-X( 1) = ( -1.01547811808955E-01, -2.80532230082858E-01)
-X( 2) = (  6.58306975886393E-02, -6.90650903108895E-01)
-X( 3) = (  3.02343902131716E-01,  5.67374443406716E-01)
-X( 4) = (  7.68865958839561E-01,  4.57394346295766E-02)
-
-X( 5) = ( -8.83416681812098E-01,  2.48201207517387E+00)
-
-PATH NUMBER =      1200
-
-ARCLEN =  3.45821897867487E+00
-NFE =  286
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996985773710E-01
-
-X( 1) = (  6.53693422581291E-01, -1.50248695886285E-01)
-X( 2) = (  1.09203299717257E+00,  2.96049401530086E-01)
-X( 3) = ( -2.53090759297926E-01,  6.62884318382811E-02)
-X( 4) = ( -1.96913217968221E+00, -1.59841373363239E+00)
-
-X( 5) = ( -4.33967774515229E-02,  3.25421875775535E-01)
-
-PATH NUMBER =      1201
-
-ARCLEN =  2.14334574496983E+00
-NFE =  569
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99494623663498E-01
-
-X( 1) = ( -7.52403091767373E-01,  1.39720576439036E-01)
-X( 2) = ( -1.21632727707994E+00, -4.73608232976097E-01)
-X( 3) = (  6.72967199162646E-01, -1.58960372200890E-01)
-X( 4) = (  8.65427810724655E-01,  1.86295036218611E-01)
-
-X( 5) = (  6.33033248250700E-01, -3.11652384558951E-01)
-
-PATH NUMBER =      1202
-
-ARCLEN =  1.70216381581855E+00
-NFE =  467
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99331563896485E-01
-
-X( 1) = ( -5.61499138279093E-01,  3.63137064870281E-01)
-X( 2) = ( -4.71512175740006E-01,  1.15387887500125E+00)
-X( 3) = (  6.73810642453147E-01, -5.44753374366762E-02)
-X( 4) = (  7.79716552043349E-01,  3.24776711567862E-01)
-
-X( 5) = (  2.79983864038010E-01,  3.59534565723889E-01)
-
-PATH NUMBER =      1203
-
-ARCLEN =  1.68293485111792E+00
-NFE =   97
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.76153956386665E-14
-
-X( 1) = (  4.12166943103663E+13,  1.16053726488033E+13)
-X( 2) = (  5.22202911999669E+13, -2.28935565486315E+13)
-X( 3) = (  6.41145118775109E-01,  3.84631311460898E-02)
-X( 4) = ( -2.55019778004272E+13, -3.03137961956027E+13)
-
-X( 5) = ( -8.17342070760785E-15,  2.30219489305572E-15)
-
-PATH NUMBER =      1204
-
-ARCLEN =  2.56994248199055E+00
-NFE =  352
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99888812234395E-01
-
-X( 1) = ( -4.37541450565425E-01, -3.39992196257197E-01)
-X( 2) = ( -1.55832696530606E+00, -8.11767219520406E-01)
-X( 3) = (  6.29389527647929E-01,  1.24049126779518E-01)
-X( 4) = (  8.60637618220083E-01, -1.30553552062615E-01)
-
-X( 5) = (  3.35477892949232E-01, -3.54843889176527E-01)
-
-PATH NUMBER =      1205
-
-ARCLEN =  4.40326520154891E+00
-NFE =  439
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99978591334229E-01
-
-X( 1) = (  5.41604752059603E-01, -8.64038302566233E-01)
-X( 2) = ( -5.15296083249382E-02, -7.99965488283232E-01)
-X( 3) = (  6.61114455182304E-02,  5.10114015425988E-02)
-X( 4) = (  1.01784403812611E+00, -1.22724997208650E-02)
-
-X( 5) = ( -4.40841701936166E-02, -5.74762964721642E-01)
-
-PATH NUMBER =      1206
-
-ARCLEN =  1.84094510158730E+00
-NFE =  226
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999895E-01
-
-X( 1) = ( -4.18568472919464E+01, -2.14741071163361E+02)
-X( 2) = ( -5.61582375714947E+02, -1.96479661555033E+02)
-X( 3) = ( -3.66047548152917E-02,  4.35855829081363E-02)
-X( 4) = (  9.65300130061826E-01,  4.52998593943566E-02)
-
-X( 5) = (  5.34045685410273E-04, -8.46197876033794E-04)
-
-PATH NUMBER =      1207
-
-ARCLEN =  3.23736366413125E+00
-NFE =  374
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998225308539E-01
-
-X( 1) = (  4.94648432261727E-01,  6.53116677055327E-01)
-X( 2) = (  2.88532679599719E-01, -1.31581645258950E+00)
-X( 3) = (  8.31117021929068E-01, -1.83260760224647E+00)
-X( 4) = (  5.22605413859623E-01, -7.97782579275763E-02)
-
-X( 5) = ( -2.11000442375170E-01, -1.88812972956521E-01)
-
-PATH NUMBER =      1208
-
-ARCLEN =  2.18897546100756E+00
-NFE =  284
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999980E-01
-
-X( 1) = (  9.57701329953604E-01,  3.60045942085445E-02)
-X( 2) = (  3.57562223204257E-02, -1.57194954147108E-01)
-X( 3) = ( -5.53156137871135E+01, -6.73513256681344E+01)
-X( 4) = (  1.28711078526029E+02,  2.69491459228994E+01)
-
-X( 5) = (  2.69475944520555E-03, -4.45249590089124E-03)
-
-PATH NUMBER =      1209
-
-ARCLEN =  8.02650253361837E+00
-NFE =  294
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.17944878145088E-10
-
-X( 1) = (  8.94828363411338E-02,  4.85247294913207E-03)
-X( 2) = ( -2.59789618633333E+09,  5.68724002966514E+08)
-X( 3) = (  2.94335324843695E+09, -9.82188096503878E+08)
-X( 4) = (  9.13424045546582E-01, -2.03180935526761E-03)
-
-X( 5) = ( -1.16273221140249E-10, -2.89920318275686E-10)
-
-PATH NUMBER =      1210
-
-ARCLEN =  1.91237115301164E+01
-NFE =  273
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87341451172159E-01
-
-X( 1) = ( -5.18539089761043E-01,  3.83076253880713E-01)
-X( 2) = ( -8.71680274365794E-01,  1.03440221687398E-01)
-X( 3) = (  6.82684402002043E-01, -1.20903640958011E-01)
-X( 4) = (  6.56707519507131E-01,  2.56551257925060E-01)
-
-X( 5) = (  8.94743765026919E-01,  4.97794525370475E-01)
-
-PATH NUMBER =      1211
-
-ARCLEN =  3.83137104236349E+00
-NFE =  263
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.67275466109622E-08
-
-X( 1) = (  1.37416370351655E+06,  1.65294946127051E+07)
-X( 2) = (  4.55211068527700E+08,  1.76063897389794E+08)
-X( 3) = (  5.14131738444128E-01,  4.36681577926677E-03)
-X( 4) = ( -8.09882921425309E+07,  8.16588895664980E+07)
-
-X( 5) = ( -8.47190223410375E-10,  1.28868994024155E-09)
-
-PATH NUMBER =      1212
-
-ARCLEN =  2.95483191666682E+00
-NFE =  198
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.41148195976596E-08
-
-X( 1) = (  7.28198936733338E-01, -7.08629881138560E-03)
-X( 2) = ( -9.74476742522741E-01,  7.95543466508688E-02)
-X( 3) = ( -5.06253834223393E+06, -8.98970507966795E+05)
-X( 4) = (  7.01687899467188E+06,  1.59683599284529E+06)
-
-X( 5) = (  8.89547031410632E-08, -5.62643927207846E-08)
-
-PATH NUMBER =      1213
-
-ARCLEN =  7.36816289985383E+00
-NFE =  265
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.57178592096216E-13
-
-X( 1) = (  1.13942879628598E+12,  6.04897315858652E+12)
-X( 2) = ( -9.75666552323695E+12,  1.39731311820079E+13)
-X( 3) = (  5.70957073386128E+12, -6.43630868062047E+12)
-X( 4) = (  4.92142111604349E-01, -5.92107391671675E-03)
-
-X( 5) = (  1.18043595731532E-13,  5.16877122699877E-14)
-
-PATH NUMBER =      1214
-
-ARCLEN =  1.08222698290384E+01
-NFE =  501
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99002997850855E-01
-
-X( 1) = ( -2.14032309078632E-02,  4.73288132135459E-01)
-X( 2) = (  1.94966212122107E-01, -2.08647027852264E-01)
-X( 3) = ( -9.03975163537326E-02, -9.10359757469917E-01)
-X( 4) = (  5.38823293487604E-01,  7.17921681911039E-02)
-
-X( 5) = (  4.82498618680746E+00, -2.72704787971110E+00)
-
-PATH NUMBER =      1215
-
-ARCLEN =  2.89718867440208E+00
-NFE =  270
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999909E-01
-
-X( 1) = (  1.02311415489139E+00, -6.05534302336673E-01)
-X( 2) = ( -9.87575895711547E+01,  4.05340252112318E+00)
-X( 3) = (  5.61518201106071E-02,  6.44688365173015E-02)
-X( 4) = (  8.85219605727649E-01,  2.50420997702826E-01)
-
-X( 5) = (  6.79675535160852E-03, -5.26949186681404E-03)
-
-PATH NUMBER =      1216
-
-ARCLEN =  2.73639766973235E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999995E-01
-
-X( 1) = (  5.76589718287688E-01,  3.08818021559541E-02)
-X( 2) = (  5.11769433435717E-01, -1.16291904803742E+02)
-X( 3) = (  8.31151180248258E-01, -6.76024982860109E-02)
-X( 4) = ( -1.88837071421785E-01, -5.03680403889222E-02)
-
-X( 5) = ( -4.73776928129124E-03, -5.54362959527895E-03)
-
-PATH NUMBER =      1217
-
-ARCLEN =  1.71081403029543E+00
-NFE =  320
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996750849737E-01
-
-X( 1) = (  5.25706522846767E-01,  5.83889112847681E-01)
-X( 2) = (  4.63834491976831E-01, -1.13229246359196E+00)
-X( 3) = (  1.87682139076355E+00, -2.05946347893432E-01)
-X( 4) = (  3.19923066676134E-01,  6.22688707826004E-03)
-
-X( 5) = ( -2.32829534286104E-01,  4.51657928524904E-03)
-
-PATH NUMBER =      1218
-
-ARCLEN =  2.42839734458230E+00
-NFE =  239
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999093E-01
-
-X( 1) = (  6.00186993138264E-01,  3.09496364016467E-01)
-X( 2) = (  6.12386508874165E+01, -3.39078086021012E+02)
-X( 3) = (  4.67266319255730E-01, -3.82211950942424E-01)
-X( 4) = (  1.24312642641782E+02,  1.25945977008529E+02)
-
-X( 5) = ( -1.38443284470882E-03, -1.44977557170874E-03)
-
-PATH NUMBER =      1219
-
-ARCLEN =  4.34231825293994E+00
-NFE =  436
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999904E-01
-
-X( 1) = (  8.78572451838731E-01, -5.82461989746780E-03)
-X( 2) = ( -4.46953269477751E+02,  3.04272861845150E+02)
-X( 3) = ( -2.77601757710618E-01,  1.01931190477129E-01)
-X( 4) = ( -4.31958983133988E+01, -3.96643620163003E+01)
-
-X( 5) = (  1.55590140220820E-03, -6.16228320947080E-05)
-
-PATH NUMBER =      1220
-
-ARCLEN =  2.75559380385093E+01
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999834E-01
-
-X( 1) = ( -7.17016115646837E-02,  1.08506161469106E-02)
-X( 2) = ( -1.99122919388992E+02, -2.74275105606822E+02)
-X( 3) = (  8.97671773556677E-01, -1.84444572002634E-04)
-X( 4) = (  1.49006943119430E+02,  8.65176004124844E+01)
-
-X( 5) = ( -1.28909342653862E-04, -1.99410494316104E-03)
-
-PATH NUMBER =      1221
-
-ARCLEN =  6.66909711171169E+00
-NFE =  201
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999986E-01
-
-X( 1) = (  5.07933337643900E-01, -7.55933711478570E-01)
-X( 2) = (  4.34206212028102E+00, -1.13351508179988E+02)
-X( 3) = (  4.92882286110639E-01, -5.78021755192127E-03)
-X( 4) = (  5.25513038920549E-01,  7.57473859975861E-01)
-
-X( 5) = ( -4.96132440863301E-03, -5.54532807701329E-03)
-
-PATH NUMBER =      1222
-
-ARCLEN =  6.03357526469849E+00
-NFE =  353
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999966E-01
-
-X( 1) = ( -7.34276283090739E+01, -1.13444737575392E+02)
-X( 2) = (  1.35041981748305E+00,  5.13876119679120E-03)
-X( 3) = (  1.29274815508390E-01,  6.53192824420181E-03)
-X( 4) = ( -3.24678231784142E+01,  3.40199208970791E+01)
-
-X( 5) = (  5.16460985368476E-03, -3.72085086206027E-03)
-
-PATH NUMBER =      1223
-
-ARCLEN =  2.24954126404121E+00
-NFE =  271
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999971E-01
-
-X( 1) = ( -1.73571235544213E+00, -7.69205370207927E-01)
-X( 2) = ( -2.00290029996881E+02, -2.33136544789568E+01)
-X( 3) = (  8.70247184855825E-01,  2.90534782009643E-03)
-X( 4) = ( -2.00322387978497E-01,  1.90433316223921E-01)
-
-X( 5) = (  2.93438003099219E-03, -3.02116435044002E-03)
-
-PATH NUMBER =      1224
-
-ARCLEN =  2.25977540756354E+00
-NFE =  273
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999294E-01
-
-X( 1) = (  8.91702630196130E-01, -5.73202434487148E-04)
-X( 2) = (  4.72477028868480E+02, -5.00125472998593E+02)
-X( 3) = ( -3.94743094233262E+01,  2.99754402958365E+02)
-X( 4) = ( -1.79258500093198E-01, -8.71150865248988E-03)
-
-X( 5) = ( -1.11349899468391E-03,  4.56983736819767E-04)
-
-PATH NUMBER =      1225
-
-ARCLEN =  1.88759961154336E+00
-NFE =  268
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999976062E-01
-
-X( 1) = (  5.27698793041427E-01,  2.64602486319834E-01)
-X( 2) = (  1.32342796710843E+01, -3.66498794153090E+01)
-X( 3) = (  4.98022855932955E-01, -1.99626259117948E-01)
-X( 4) = ( -8.23051604932397E-01,  3.12251963176231E+00)
-
-X( 5) = ( -1.82246075739271E-02, -9.89527736046114E-03)
-
-PATH NUMBER =      1226
-
-ARCLEN =  2.59269883749027E+00
-NFE =  236
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.02119697639284E-07
-
-X( 1) = (  8.64599829411653E-01,  4.89481126497595E-02)
-X( 2) = (  1.46380178794660E-01, -2.43426329025789E-01)
-X( 3) = ( -2.39128272580078E+05, -7.43694781496475E+05)
-X( 4) = ( -1.39597083764852E+05,  9.49525784347322E+05)
-
-X( 5) = ( -1.17812903157113E-07, -8.27764069640143E-07)
-
-PATH NUMBER =      1227
-
-ARCLEN =  2.33087520713428E+00
-NFE =  244
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999969E-01
-
-X( 1) = ( -6.95635183701809E+01,  1.21407009630375E+02)
-X( 2) = (  9.41285179527879E-01, -6.38637197590256E-02)
-X( 3) = (  1.16211878190739E+02, -4.76436988383906E+01)
-X( 4) = ( -7.90896680699283E-03,  6.48331325762201E-03)
-
-X( 5) = ( -4.13304828405470E-03,  3.63405180929311E-03)
-
-PATH NUMBER =      1228
-
-ARCLEN =  2.81524435014180E+01
-NFE =  403
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.91890890171004E-01
-
-X( 1) = ( -5.58251665965262E-01,  2.36191571349307E-01)
-X( 2) = ( -8.41482302927081E-01,  2.26631508851590E-01)
-X( 3) = (  8.00352509350073E-01, -1.32070540676356E-01)
-X( 4) = (  7.40561670240198E-01,  2.66889522325165E-01)
-
-X( 5) = (  9.41497885243561E-01,  3.90089011993642E-01)
-
-PATH NUMBER =      1229
-
-ARCLEN =  6.94423164991919E+00
-NFE =  424
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999985179807E-01
-
-X( 1) = (  3.64654140714993E-01, -2.25721533696743E-01)
-X( 2) = (  1.60629502917620E+00, -9.55194296970076E-01)
-X( 3) = (  4.37177306985702E-01,  6.71040740515091E-02)
-X( 4) = ( -6.32023616397962E+00,  1.92737828984850E+00)
-
-X( 5) = ( -1.26659699322040E-01,  8.60870880154830E-02)
-
-PATH NUMBER =      1230
-
-ARCLEN =  1.24007603900045E+01
-NFE =  376
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999800E-01
-
-X( 1) = (  8.08458166183317E-01,  4.59987232318930E-01)
-X( 2) = ( -5.59759606105482E+02, -5.31877727730426E+02)
-X( 3) = (  4.29202878802774E-01,  3.83771319104936E-01)
-X( 4) = (  3.56498986596859E+02, -8.45089757227059E+01)
-
-X( 5) = (  2.06201841030853E-04, -8.89414955943475E-04)
-
-PATH NUMBER =      1231
-
-ARCLEN =  1.22837815042842E+01
-NFE =  423
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999923367273E-01
-
-X( 1) = ( -8.32204893258194E-02,  2.50607361968205E-02)
-X( 2) = ( -1.03844091620165E+01, -6.88378008640078E+00)
-X( 3) = (  9.38430513234963E-01,  1.30956980134750E-02)
-X( 4) = ( -1.14222484016517E+01,  2.43912440821970E+00)
-
-X( 5) = ( -1.52419721361276E-02, -1.29180069543878E-01)
-
-PATH NUMBER =      1232
-
-ARCLEN =  3.21714665691304E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999867057E-01
-
-X( 1) = (  4.96779691782322E-01, -2.50293942039671E-01)
-X( 2) = (  2.84833834331254E+01, -4.74249432037893E+01)
-X( 3) = (  4.94997598477115E-01,  2.23507397165001E-01)
-X( 4) = (  2.21048086884932E+00, -1.51456028424820E+01)
-
-X( 5) = ( -1.68066980926197E-02, -5.69511869984551E-03)
-
-PATH NUMBER =      1233
-
-ARCLEN =  2.24773881648238E+00
-NFE =  223
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99928830752491E-01
-
-X( 1) = (  6.16743019673141E-01, -1.45832864659932E-02)
-X( 2) = (  4.95764397265841E-01, -1.89916325974435E+00)
-X( 3) = (  7.67295774005467E-01, -2.96762645482658E-01)
-X( 4) = ( -2.99321027748948E-01, -2.21904280109846E-01)
-
-X( 5) = ( -2.82304739045891E-01, -9.26357431322763E-02)
-
-PATH NUMBER =      1234
-
-ARCLEN =  1.79236583101532E+00
-NFE =  280
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99794592862663E-01
-
-X( 1) = (  1.67826915594255E-01,  3.09664770793931E-02)
-X( 2) = (  4.52008834034812E-01, -1.45381181671266E+00)
-X( 3) = (  9.68092512344607E-01, -7.30449948002433E-02)
-X( 4) = (  1.83090916419926E-01, -6.37056736037698E-01)
-
-X( 5) = ( -4.45198436208331E-01, -4.51548129955278E-02)
-
-PATH NUMBER =      1235
-
-ARCLEN =  2.66459459248801E+00
-NFE =  327
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999988E-01
-
-X( 1) = (  5.53678580010511E-01, -6.49223390952037E-02)
-X( 2) = (  4.06915944476289E+00, -1.01506117550929E+02)
-X( 3) = (  8.73493931900984E-01,  9.85006499880503E-02)
-X( 4) = ( -1.70055509355932E-01,  9.98169816631760E-02)
-
-X( 5) = ( -5.65454025268359E-03, -6.13074109138099E-03)
-
-PATH NUMBER =      1236
-
-ARCLEN =  3.81872195850125E+01
-NFE =  530
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.89240713652074E-01
-
-X( 1) = ( -2.78388967224779E-01,  1.52002772545888E-01)
-X( 2) = ( -3.82904335472373E-01, -2.26287572140501E-01)
-X( 3) = (  5.63780364315680E-01, -2.86987934683677E-01)
-X( 4) = (  5.58169997835100E-01,  1.87160718851727E-01)
-
-X( 5) = (  5.56574419876093E+00, -9.41207190457976E-01)
-
-PATH NUMBER =      1237
-
-ARCLEN =  4.10965283954180E+00
-NFE =  254
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.41659093577015E-12
-
-X( 1) = ( -2.42322574767682E+12, -4.23741254838684E+12)
-X( 2) = (  7.89999693401460E+12, -1.28492501238633E+12)
-X( 3) = ( -4.77701027061211E+12,  4.26070522501091E+12)
-X( 4) = (  5.28282508798395E-01,  1.98792112579196E-02)
-
-X( 5) = (  5.86830660020271E-14,  1.14283148916483E-13)
-
-PATH NUMBER =      1238
-
-ARCLEN =  3.43107845558858E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99964210992950E-01
-
-X( 1) = ( -1.30669395303826E-01,  3.98714995042438E-01)
-X( 2) = (  1.11512093382514E+00,  2.20104628565911E-01)
-X( 3) = (  6.74826483071258E-01,  7.31295956308147E-01)
-X( 4) = (  2.42145006714950E-01,  3.72398000370533E-02)
-
-X( 5) = ( -1.07300209262689E-01,  2.56002527687703E-01)
-
-PATH NUMBER =      1239
-
-ARCLEN =  4.28180826897519E+00
-NFE =  256
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999979E-01
-
-X( 1) = ( -4.26642743745124E+01,  3.91563401035104E+01)
-X( 2) = ( -2.62681040550575E+00,  2.55258443844835E-01)
-X( 3) = (  8.77123570712929E-01, -5.11370820550533E-03)
-X( 4) = ( -2.95498275167330E-01, -3.75580369130705E-02)
-
-X( 5) = (  5.30595521051945E-03,  1.13760679570395E-02)
-
-PATH NUMBER =      1240
-
-ARCLEN =  1.36152630552128E+01
-NFE =  322
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999923E-01
-
-X( 1) = (  1.01229963748901E+00,  6.74563839918386E-02)
-X( 2) = ( -3.97584530261952E+01, -9.62116361193335E-01)
-X( 3) = (  1.60106395756778E-02,  7.49560178511027E-02)
-X( 4) = (  1.51154200145314E+02, -5.34274771632067E+01)
-
-X( 5) = (  5.16626599686563E-03, -4.81650461289290E-03)
-
-PATH NUMBER =      1241
-
-ARCLEN =  9.77031246831629E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999988069714E-01
-
-X( 1) = (  3.11985224149854E+00,  7.44335013333728E+00)
-X( 2) = ( -4.42334100032739E-01, -1.38365407420644E-02)
-X( 3) = (  8.69890635953140E-01, -9.69244046342823E-04)
-X( 4) = ( -3.99127385724588E+00, -2.50846110865238E+00)
-
-X( 5) = ( -4.38460801369271E-02,  5.87664679143107E-02)
-
-PATH NUMBER =      1242
-
-ARCLEN =  1.11430955691640E+01
-NFE =  369
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999939E-01
-
-X( 1) = (  1.34724012454100E-02,  1.41654044050834E-01)
-X( 2) = ( -9.93445555289972E+02, -4.40103517828301E+02)
-X( 3) = (  1.04255983803851E+00,  8.20995744196652E-02)
-X( 4) = ( -2.04839653153479E+02, -9.39636868040799E+01)
-
-X( 5) = (  4.22990036129225E-04, -7.56632111058209E-04)
-
-PATH NUMBER =      1243
-
-ARCLEN =  9.50145163707104E+00
-NFE =  727
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999969E-01
-
-X( 1) = ( -3.48235881423013E-01, -4.07233576677882E-02)
-X( 2) = (  7.59569356595598E+02, -7.50881679489986E+02)
-X( 3) = (  7.73609266211615E-01,  5.20312248732517E-02)
-X( 4) = (  1.50042856781264E+02,  2.95597261977246E+01)
-
-X( 5) = ( -7.95360169728254E-04, -1.27896636600017E-04)
-
-PATH NUMBER =      1244
-
-ARCLEN =  3.84620253354558E+00
-NFE =  214
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.54118370640464E-10
-
-X( 1) = ( -2.63278410213087E+08,  2.25922640431560E+09)
-X( 2) = (  5.06627012943589E-01, -2.72174171845280E-01)
-X( 3) = (  1.51003589356335E+09, -1.76162708976272E+09)
-X( 4) = (  9.97733360000176E+08, -2.04523823606337E+09)
-
-X( 5) = ( -5.96954361268241E-10,  1.94035725258491E-10)
-
-PATH NUMBER =      1245
-
-ARCLEN =  2.52322482287491E+00
-NFE =  252
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.25277871858234E-07
-
-X( 1) = ( -9.57539595706572E+06, -1.76956682586909E+07)
-X( 2) = (  5.86343325093501E-01, -7.73955327983851E-02)
-X( 3) = ( -8.72881699890436E+06,  2.81314964360034E+07)
-X( 4) = (  2.78454833867719E-01,  1.54973525612357E+00)
-
-X( 5) = (  2.11183859248208E-08,  1.46397244098965E-08)
-
-PATH NUMBER =      1246
-
-ARCLEN =  1.84310909212040E+00
-NFE =  160
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.88126594099917E-12
-
-X( 1) = (  7.61987731434692E+10,  4.97015836930556E+11)
-X( 2) = (  4.65755718066351E-01, -2.88512496213977E-01)
-X( 3) = (  7.39379751730195E+11, -3.32322083592624E+11)
-X( 4) = ( -1.13582877259318E+11, -3.03160009380127E+11)
-
-X( 5) = ( -7.86580517516886E-13,  1.41375843323854E-13)
-
-PATH NUMBER =      1247
-
-ARCLEN =  2.00616044508155E+00
-NFE =  345
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998047434513E-01
-
-X( 1) = ( -2.02455777460204E+00,  1.47157322090579E+00)
-X( 2) = ( -1.97278277193649E-01,  1.90231622700221E-01)
-X( 3) = (  9.74323563352051E-01,  1.26926450175283E-01)
-X( 4) = (  6.82532087344355E-01, -3.96124266508104E-02)
-
-X( 5) = (  8.90209245051213E-02,  2.41075797424117E-01)
-
-PATH NUMBER =      1248
-
-ARCLEN =  1.46159261268950E+02
-NFE =  445
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999937E-01
-
-X( 1) = (  2.67324770531925E-02, -3.09453394414537E-01)
-X( 2) = (  9.06019779021956E+02,  7.00794347667945E+01)
-X( 3) = (  9.09319149509097E-01,  3.47240926901787E-02)
-X( 4) = ( -9.39588554529936E+01,  1.94955436522629E+02)
-
-X( 5) = ( -6.62789744280385E-04,  5.47150082135755E-04)
-
-PATH NUMBER =      1249
-
-ARCLEN =  3.79870291550500E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999981E-01
-
-X( 1) = ( -1.81257445932709E+02,  3.62394767858618E+00)
-X( 2) = (  8.51360167120811E-02,  2.47192457548543E-01)
-X( 3) = (  9.02064504910116E-01, -8.54410510697800E-02)
-X( 4) = (  6.61886455911188E+01,  4.50025885366715E+01)
-
-X( 5) = (  4.25901810721493E-03,  1.14139854732664E-03)
-
-PATH NUMBER =      1250
-
-ARCLEN =  4.26774487917320E+01
-NFE =  668
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.07423559738201E-12
-
-X( 1) = ( -6.47014552256978E+11, -1.31397537404629E+11)
-X( 2) = (  8.55777101858345E+11, -6.71376714716466E+11)
-X( 3) = (  4.95732854237705E-01,  2.43936117220624E-03)
-X( 4) = (  1.07249733902692E+12, -3.50790001796371E+11)
-
-X( 5) = (  1.21545210961943E-12, -3.57376563238365E-12)
-
-PATH NUMBER =      1251
-
-ARCLEN =  8.77822623611285E+01
-NFE =  288
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.70039660703310E-01
-
-X( 1) = ( -8.56564748754000E-01,  2.64331802567488E-01)
-X( 2) = ( -8.11262218342269E-01, -1.88658455238415E+00)
-X( 3) = (  9.41564612672711E-01,  1.14370200459434E-01)
-X( 4) = ( -3.80213325605140E-01, -1.29701486966877E+00)
-
-X( 5) = ( -1.23215932622067E+01,  2.11277919228955E+01)
-
-PATH NUMBER =      1252
-
-ARCLEN =  7.20486808806483E+00
-NFE =  392
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99061807935824E-01
-
-X( 1) = ( -5.72238188293273E-01, -4.93239172466301E-02)
-X( 2) = (  1.33928086388305E-01, -9.25925378528922E-01)
-X( 3) = (  7.54380125410160E-01,  1.02042122828487E-01)
-X( 4) = (  8.20561255158365E-01, -8.68320390257624E-01)
-
-X( 5) = (  1.33903599063852E-01,  3.33943036214088E+00)
-
-PATH NUMBER =      1253
-
-ARCLEN =  2.04382112208246E+00
-NFE =  323
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98392729306722E-01
-
-X( 1) = ( -1.37055338228956E-02,  2.30969438373884E-01)
-X( 2) = (  5.79878322204325E-01, -1.91316768045857E-01)
-X( 3) = (  8.19499031379957E-01, -1.39887302279829E-02)
-X( 4) = (  4.59766704071601E-02, -5.51941239427896E-01)
-
-X( 5) = ( -3.20892576693610E-01,  4.17283882200259E-01)
-
-PATH NUMBER =      1254
-
-ARCLEN =  1.46111522622317E+00
-NFE =  207
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98412860604261E-01
-
-X( 1) = ( -4.10472839782365E-01,  8.37509372416258E-01)
-X( 2) = (  1.43730414152332E-01,  2.45467166700483E-01)
-X( 3) = (  1.05452357782327E+00,  9.39354847143617E-02)
-X( 4) = (  7.36460339266740E-01, -6.69314377373873E-01)
-
-X( 5) = ( -6.26012729176108E-02,  4.15658753494794E-01)
-
-PATH NUMBER =      1255
-
-ARCLEN =  2.05819535171567E+00
-NFE =  443
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99954454003513E-01
-
-X( 1) = ( -7.19506781720399E-01,  1.33572649692760E+00)
-X( 2) = (  5.44360608078454E-01,  4.56505664516873E-01)
-X( 3) = (  3.90680664186831E-01, -2.34810784626753E-01)
-X( 4) = (  1.25488950430591E+00, -8.62371878784190E-01)
-
-X( 5) = (  7.58485105774933E-02,  3.13904599992942E-01)
-
-PATH NUMBER =      1256
-
-ARCLEN =  4.50413715414136E+00
-NFE =  493
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994805582944E-01
-
-X( 1) = ( -2.06302335155293E+00,  6.16387636585885E-01)
-X( 2) = (  3.52024927068679E-01, -6.81123624241861E-01)
-X( 3) = (  1.48612968211353E+00, -5.16185453606287E-01)
-X( 4) = (  5.48721971453908E-01,  1.42322844785752E-01)
-
-X( 5) = ( -4.03632509300853E-02,  7.51285644883147E-01)
-
-PATH NUMBER =      1257
-
-ARCLEN =  2.92145873319334E+00
-NFE =  338
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99987064706002E-01
-
-X( 1) = ( -1.85079156470979E+00, -5.21374917977952E-01)
-X( 2) = (  2.16311717293267E-01, -4.11190973417242E-01)
-X( 3) = (  8.05420955469157E-01,  4.99555863571435E-02)
-X( 4) = ( -1.21240446980856E-01,  3.40108374772571E-01)
-
-X( 5) = (  4.72005605610057E-01,  4.01963684143878E-01)
-
-PATH NUMBER =      1258
-
-ARCLEN =  2.80421279567994E+00
-NFE =  585
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99983424147818E-01
-
-X( 1) = ( -1.51435899645577E+00,  4.64736191715459E-01)
-X( 2) = (  1.17030188821932E-02, -5.36532087397781E-03)
-X( 3) = (  8.36179545701528E-01,  6.86028628200660E-03)
-X( 4) = (  1.33845661609505E+00, -2.60097143162694E-01)
-
-X( 5) = (  3.03095219079853E-01,  3.48516771643220E-01)
-
-PATH NUMBER =      1259
-
-ARCLEN =  1.15514700240731E+01
-NFE =  407
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999643E-01
-
-X( 1) = ( -5.92160810177860E-02, -5.26949178310362E-04)
-X( 2) = ( -5.13907037613494E+00, -4.26473562258660E-01)
-X( 3) = (  9.67386294657237E-01, -2.88373882673715E-03)
-X( 4) = ( -3.35839026822613E+01, -3.81389652605131E+01)
-
-X( 5) = (  1.77498141585369E-02,  2.96557429056102E-02)
-
-PATH NUMBER =      1260
-
-ARCLEN =  7.25058824420977E+01
-NFE =  407
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999927E-01
-
-X( 1) = (  4.79493714258664E-01, -2.22093432728442E-01)
-X( 2) = ( -1.48039721537415E+01, -1.34758738692311E+02)
-X( 3) = (  4.82479800468953E-01,  2.46445991010968E-01)
-X( 4) = (  5.59651025724552E+00,  4.21088122238815E+00)
-
-X( 5) = ( -3.35357399932373E-03, -5.13819883558634E-03)
-
-PATH NUMBER =      1261
-
-ARCLEN =  8.90857683631532E+00
-NFE =  178
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.68966064637942E-01
-
-X( 1) = ( -3.91836429359561E-01, -8.35021244913724E-02)
-X( 2) = ( -3.07696731287617E-01, -8.05193324167000E-01)
-X( 3) = (  6.66466894573769E-01,  8.90138658861402E-02)
-X( 4) = (  4.24072023014376E-01, -5.93696421177134E-01)
-
-X( 5) = (  5.42980869478285E+00,  2.00964548444969E+00)
-
-PATH NUMBER =      1262
-
-ARCLEN =  3.99583162321384E+00
-NFE =  411
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99245763038121E-01
-
-X( 1) = ( -1.60521539497043E-01,  1.00887156932095E-01)
-X( 2) = ( -3.61331552499356E-02, -2.18493523822602E-01)
-X( 3) = (  9.59918050174316E-01, -5.87114656494403E-02)
-X( 4) = (  6.86183842097624E-01, -4.03619152338902E-01)
-
-X( 5) = ( -1.02954149828462E+00,  1.08385401920783E+00)
-
-PATH NUMBER =      1263
-
-ARCLEN =  1.68317255627240E+00
-NFE =  386
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95321769103882E-01
-
-X( 1) = ( -3.16831377918487E-01,  5.21535618136207E-01)
-X( 2) = ( -1.82592590593066E-01,  2.46159821149974E-01)
-X( 3) = (  9.72312757390066E-01, -5.97982627195941E-02)
-X( 4) = (  7.13420169986140E-01, -4.26512518130067E-01)
-
-X( 5) = ( -7.21705374258061E-03,  7.13797150612144E-01)
-
-PATH NUMBER =      1264
-
-ARCLEN =  1.18348810662921E+00
-NFE =  306
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.89617864054237E-01
-
-X( 1) = ( -8.20570432147695E-01,  5.00750401936163E-01)
-X( 2) = ( -5.77203001045809E-01,  1.60340070879441E-01)
-X( 3) = (  9.71215695721133E-01,  9.27801321514770E-02)
-X( 4) = (  6.99012289172027E-01, -8.94259951714961E-02)
-
-X( 5) = (  2.90814531846940E-01,  5.59588230069871E-01)
-
-PATH NUMBER =      1265
-
-ARCLEN =  2.01189756556948E+00
-NFE =  492
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99546755765639E-01
-
-X( 1) = ( -1.07412385343501E+00,  3.85486407696308E-01)
-X( 2) = ( -2.50380412118806E-01,  4.54617625703972E-01)
-X( 3) = (  6.89961354275279E-01, -4.51163865438472E-02)
-X( 4) = (  9.34967820837789E-01,  2.30335228410114E-01)
-
-X( 5) = (  3.23145630787533E-01,  3.73189841131173E-01)
-
-PATH NUMBER =      1266
-
-ARCLEN =  1.60194912163944E+00
-NFE =  224
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.72564227678002E-01
-
-X( 1) = ( -8.54150944061286E-01,  4.80131944213532E-01)
-X( 2) = ( -5.87059714635040E-01,  7.92860273304721E-02)
-X( 3) = (  7.80413068595631E-01,  1.72912845175724E-01)
-X( 4) = (  6.95421940143890E-01, -2.48728024369735E-01)
-
-X( 5) = (  3.19406061029306E-01,  4.42208151351794E-01)
-
-PATH NUMBER =      1267
-
-ARCLEN =  2.42698638201304E+00
-NFE =  247
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.23200071407834E-14
-
-X( 1) = (  7.73492794834072E+11,  2.56459124949798E+11)
-X( 2) = (  7.61805513434900E+11, -2.54234317035742E+11)
-X( 3) = (  4.99446937269195E-01,  2.35500122775542E-03)
-X( 4) = ( -2.82998875688545E+11, -1.48875600580359E+11)
-
-X( 5) = ( -4.80174792072061E-13,  1.02579836985806E-13)
-
-PATH NUMBER =      1268
-
-ARCLEN =  7.32988731581499E+00
-NFE =  521
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999977012E-01
-
-X( 1) = (  1.12388662801323E+00,  4.21291143809281E-02)
-X( 2) = (  3.68082135581339E+00, -1.14011621170867E+00)
-X( 3) = (  5.94862282016826E-02,  8.34660685883047E-03)
-X( 4) = (  1.53081112084261E+01,  1.46780141447163E+01)
-
-X( 5) = ( -4.93438973010726E-02, -5.52446076124942E-02)
-
-PATH NUMBER =      1269
-
-ARCLEN =  7.02402530996561E+00
-NFE =  414
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99935319713915E-01
-
-X( 1) = ( -4.37679201890091E-01, -9.88824545499609E-01)
-X( 2) = (  3.54529668119816E-01, -1.16603226817512E+00)
-X( 3) = (  5.80426307310374E-01,  6.38998083667808E-02)
-X( 4) = (  7.42091016830173E-01, -7.34669360198292E-01)
-
-X( 5) = (  1.20017657838116E-01, -9.42321838149333E-01)
-
-PATH NUMBER =      1270
-
-ARCLEN =  2.98219388575706E+00
-NFE =  297
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93847106424919E-01
-
-X( 1) = ( -4.23812738048099E-01, -2.83540447873826E-01)
-X( 2) = ( -5.75549843662407E-01, -9.00441267172330E-01)
-X( 3) = (  6.76285400547188E-01,  1.29773592242512E-01)
-X( 4) = (  5.99558944041399E-01, -4.04212648254902E-01)
-
-X( 5) = (  8.72811814423786E-01, -1.16032288500163E+00)
-
-PATH NUMBER =      1271
-
-ARCLEN =  4.35864875523413E+00
-NFE =  403
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96013142647905E-01
-
-X( 1) = ( -2.43922080168087E-01, -3.41750278417045E-01)
-X( 2) = (  6.19664341086459E-02, -4.51556308596808E-01)
-X( 3) = (  2.96149037816790E-01,  6.04951225067120E-02)
-X( 4) = (  8.05275805746977E-01,  2.63713191345953E-02)
-
-X( 5) = (  2.59236270553701E+00, -1.06149700608015E+00)
-
-PATH NUMBER =      1272
-
-ARCLEN =  4.65404659634601E+00
-NFE =  350
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98579835550151E-01
-
-X( 1) = ( -3.32965610873917E-01,  9.41820065613232E-02)
-X( 2) = ( -3.31380821515170E-01, -1.08067050648255E-01)
-X( 3) = (  7.41228315396145E-01, -1.19239142736565E-01)
-X( 4) = (  7.60229600777765E-01,  7.59236031505648E-02)
-
-X( 5) = (  2.29833132254631E+00,  2.77413979252000E+00)
-
-PATH NUMBER =      1273
-
-ARCLEN =  1.42568928009235E+00
-NFE =  225
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90428481797547E-01
-
-X( 1) = ( -5.12129412083894E-01,  2.24499269534529E-01)
-X( 2) = ( -6.55704188487611E-01,  6.95415119392931E-02)
-X( 3) = (  8.39636661634595E-01, -8.38368155964754E-02)
-X( 4) = (  6.38056484568292E-01,  1.45804478418766E-01)
-
-X( 5) = (  1.02620192347644E+00,  9.02812442254024E-01)
-
-PATH NUMBER =      1274
-
-ARCLEN =  5.21298742607905E+00
-NFE =  649
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99221118490268E-01
-
-X( 1) = ( -6.13764201067280E-01, -1.41236180823313E-01)
-X( 2) = ( -3.03240103985663E-01,  3.77978742090233E-01)
-X( 3) = (  9.28056473704094E-01, -4.08891556815037E-02)
-X( 4) = (  7.16786707914607E-01,  9.36586964240120E-01)
-
-X( 5) = (  1.07418829360367E+00,  1.69318510207799E+00)
-
-PATH NUMBER =      1275
-
-ARCLEN =  4.16579034849199E+00
-NFE =  120
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.05522361590681E-14
-
-X( 1) = (  2.81424904565571E+13,  9.30737980126449E+12)
-X( 2) = (  4.33278629536465E+13,  5.52799372680948E+12)
-X( 3) = ( -2.59160249680472E+13, -5.56209583526373E+12)
-X( 4) = (  5.07411258538603E-01, -8.94670741545267E-04)
-
-X( 5) = ( -1.69574640787595E-14,  1.17915659875178E-14)
-
-PATH NUMBER =      1276
-
-ARCLEN =  1.24643817679064E+01
-NFE =  311
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.44338808998363E-08
-
-X( 1) = (  8.88672146043946E+06,  2.54336564446401E+07)
-X( 2) = ( -5.95169087046336E+07,  1.25903546128856E+07)
-X( 3) = ( -2.17432185332133E+00,  2.72451265727138E-01)
-X( 4) = (  6.36564753085376E-01, -3.36890031935711E-02)
-
-X( 5) = (  2.56510616382095E-08, -4.15912266069464E-09)
-
-PATH NUMBER =      1277
-
-ARCLEN =  2.28952672353457E+00
-NFE =  308
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94555351787033E-01
-
-X( 1) = ( -7.52019224452313E-01, -8.89979704018508E-02)
-X( 2) = ( -5.16101011108744E-01, -4.79797183268418E-01)
-X( 3) = (  6.56964593661435E-01,  2.82479436393501E-01)
-X( 4) = (  8.17487576367247E-01, -8.65731927581820E-02)
-
-X( 5) = (  1.00564439116771E+00,  3.52214950131629E-01)
-
-PATH NUMBER =      1278
-
-ARCLEN =  5.15836121189620E+00
-NFE =  440
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999990E-01
-
-X( 1) = (  5.00016312767392E-01, -2.33714194691530E-01)
-X( 2) = (  4.09809275344866E+02, -9.90599843655304E+02)
-X( 3) = (  1.35967692835467E+02,  3.44778209344978E+02)
-X( 4) = (  5.00991055804554E-01,  2.32970536909710E-01)
-
-X( 5) = ( -7.49559665810949E-04, -7.11973257072399E-05)
-
-PATH NUMBER =      1279
-
-ARCLEN =  3.36330868586484E+00
-NFE =  319
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999981E-01
-
-X( 1) = ( -1.34909249311260E-01,  4.41741681393067E-03)
-X( 2) = ( -1.48062295744000E+03,  4.00336182819818E+02)
-X( 3) = (  7.50018280950492E+02, -6.28715955098345E+02)
-X( 4) = (  8.93720153889489E-01,  2.50215815798258E-04)
-
-X( 5) = (  2.05966702838479E-04, -5.21994432934269E-04)
-
-PATH NUMBER =      1280
-
-ARCLEN =  4.22365184880565E+00
-NFE =  327
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99973041075598E-01
-
-X( 1) = (  2.89146563715688E-01, -3.67770646098084E-01)
-X( 2) = (  9.24591773738601E-01, -1.00088699657053E+00)
-X( 3) = (  3.86193863844041E-01, -5.37654678552184E-01)
-X( 4) = (  5.58737452998941E-01,  5.48400494706482E-01)
-
-X( 5) = ( -3.81006291136348E-01, -2.24702252660694E-01)
-
-PATH NUMBER =      1281
-
-ARCLEN =  1.54826177433867E+01
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.91771913371195E-01
-
-X( 1) = ( -2.06744877435392E-01,  3.56017905526179E-02)
-X( 2) = ( -5.23779415788027E-01, -2.08878027568570E-01)
-X( 3) = (  6.55632114455422E-01, -4.38220097883309E-02)
-X( 4) = (  6.51829585061821E-01,  2.52881056531663E-01)
-
-X( 5) = (  6.51890464675070E+00, -2.18075885094324E+00)
-
-PATH NUMBER =      1282
-
-ARCLEN =  7.71770705570744E+00
-NFE =  368
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98982205069785E-01
-
-X( 1) = ( -2.28257816215234E-01,  3.84558859949158E-01)
-X( 2) = ( -9.96921423284987E-01,  2.93202118516890E-01)
-X( 3) = (  7.37108213072477E-01, -8.71067421222138E-02)
-X( 4) = (  8.67594147845510E-01,  3.63791128833724E-01)
-
-X( 5) = (  1.25621705624219E+00,  5.55895423019350E-01)
-
-PATH NUMBER =      1283
-
-ARCLEN =  2.76931815957334E+00
-NFE =  299
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.71115283304769E-01
-
-X( 1) = ( -4.60165211934036E-01,  1.73139846994240E-01)
-X( 2) = ( -8.87897287979133E-01, -4.77214159456886E-02)
-X( 3) = (  8.25742225362916E-01, -5.39971754071372E-02)
-X( 4) = (  5.34056615402268E-01,  2.86644940333070E-01)
-
-X( 5) = (  1.66484373416590E+00,  5.13481096016125E-01)
-
-PATH NUMBER =      1284
-
-ARCLEN =  4.45913154543735E+00
-NFE =  100
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.97459985665985E-14
-
-X( 1) = ( -3.70650385535841E+13,  1.45518711569400E+14)
-X( 2) = ( -2.38707443531927E+14,  2.77605365604218E+14)
-X( 3) = (  1.91193963167653E+14, -1.67587218484546E+14)
-X( 4) = (  4.92942863804829E-01, -2.01996794478777E-02)
-
-X( 5) = (  6.79824577708155E-15,  1.64983044587119E-15)
-
-PATH NUMBER =      1285
-
-ARCLEN =  4.21506456608852E+00
-NFE =  325
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999997136160E-01
-
-X( 1) = (  1.72288644525305E+00, -1.13534123868687E+00)
-X( 2) = (  1.36374683189893E+00,  2.14385499679287E-02)
-X( 3) = (  6.15894206985850E-02, -2.60830536934097E-02)
-X( 4) = ( -9.46082689139149E-01,  9.77793432235564E+00)
-
-X( 5) = ( -1.14327051792480E-01, -3.78954695746386E-02)
-
-PATH NUMBER =      1286
-
-ARCLEN =  3.27146164334152E+00
-NFE =  398
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99985760323817E-01
-
-X( 1) = (  9.67797483129815E-01, -1.68658121567801E+00)
-X( 2) = (  1.86095222529462E+00, -5.28861254643631E+00)
-X( 3) = (  3.91972421520400E-01,  4.81239390055164E-01)
-X( 4) = (  5.72144851864232E-01,  1.95023103491161E-01)
-
-X( 5) = ( -1.00302689102816E-01, -8.13804892554808E-02)
-
-PATH NUMBER =      1287
-
-ARCLEN =  3.20520646378812E+00
-NFE =  355
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999993E-01
-
-X( 1) = (  9.15386135502978E-01, -2.21647025055521E-03)
-X( 2) = (  9.22044937894224E+02, -2.17455401887764E+03)
-X( 3) = (  2.92744987365720E+02,  7.64148332126409E+02)
-X( 4) = (  1.22242704090580E-01, -2.03627251267901E-02)
-
-X( 5) = ( -3.40477473315378E-04, -2.89768672909471E-05)
-
-PATH NUMBER =      1288
-
-ARCLEN =  1.76417452468171E+00
-NFE =  173
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.78325366446042E-13
-
-X( 1) = (  4.56579165446731E+11,  1.25699064528343E+12)
-X( 2) = (  1.97529318920717E+12,  1.90143063359572E+12)
-X( 3) = (  4.83871906363752E-01,  5.36632537928969E-02)
-X( 4) = ( -1.16210293849613E+12, -9.42424508236776E+10)
-
-X( 5) = ( -6.24288760877473E-14,  1.70368222567746E-13)
-
-PATH NUMBER =      1289
-
-ARCLEN =  1.95044720253573E+00
-NFE =  304
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99948685483334E-01
-
-X( 1) = (  6.45741110868060E-01, -2.80185807138940E-01)
-X( 2) = ( -5.93534534426860E-01, -8.27899863225291E-01)
-X( 3) = (  6.08051300229999E-01, -5.85646545805214E-01)
-X( 4) = (  7.42994014570922E-01,  7.16780415231287E-01)
-
-X( 5) = ( -1.68614042819240E-01, -3.20988117555938E-01)
-
-PATH NUMBER =      1290
-
-ARCLEN =  2.16267281502846E+00
-NFE =  227
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.63212966551822E-11
-
-X( 1) = (  5.02204837303049E-01, -1.13608346412743E-02)
-X( 2) = ( -1.36283369347373E+10,  8.61804931484144E+09)
-X( 3) = ( -3.36136495195886E+09, -3.20385873817873E+09)
-X( 4) = (  9.43011855138039E+09, -1.06687826415691E+10)
-
-X( 5) = (  2.91973048657194E-11, -8.02877903050003E-12)
-
-PATH NUMBER =      1291
-
-ARCLEN =  6.04239827210686E+00
-NFE =  275
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999924E-01
-
-X( 1) = (  9.34976253972597E-01,  2.98668985845189E-03)
-X( 2) = ( -1.17504313499195E+02, -2.41413109460000E+01)
-X( 3) = ( -5.72400933447350E-02,  2.67428236835207E-03)
-X( 4) = (  2.16131007110386E+02, -4.21902698433195E+01)
-
-X( 5) = (  2.27484059867272E-03, -2.88913987165702E-03)
-
-PATH NUMBER =      1292
-
-ARCLEN =  1.20700266006438E+01
-NFE =  555
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999834E-01
-
-X( 1) = ( -2.23170802707200E-02, -8.89335238592210E-02)
-X( 2) = ( -3.63326570927607E+00,  5.91470673235223E+00)
-X( 3) = (  9.60201601383991E-01, -6.34495012772740E-02)
-X( 4) = (  6.52133757438790E+01, -6.48183878307723E+00)
-
-X( 5) = (  1.67265933022584E-02, -1.78646183998409E-02)
-
-PATH NUMBER =      1293
-
-ARCLEN =  6.24951428517598E+00
-NFE =  315
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999998925E-01
-
-X( 1) = ( -3.11333682670717E-02, -6.46105520537152E-02)
-X( 2) = ( -4.77106956746231E+00, -9.82027036592653E-01)
-X( 3) = (  9.84010714437983E-01, -3.76291353824675E-02)
-X( 4) = (  4.17132280622521E+01,  1.96515593304739E+01)
-
-X( 5) = (  3.48948052604396E-03, -3.15381824904619E-02)
-
-PATH NUMBER =      1294
-
-ARCLEN =  3.02003590997558E+00
-NFE =  230
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.10362808346719E-11
-
-X( 1) = ( -2.36808605661088E+10,  2.48626729882108E+09)
-X( 2) = ( -4.04316163973121E+10, -2.70785011435756E+10)
-X( 3) = (  5.22353849684116E-01,  9.20593409186897E-03)
-X( 4) = (  6.61365154967850E+10,  3.75327910288659E+10)
-
-X( 5) = (  4.79388235921988E-12, -9.48738581186409E-12)
-
-PATH NUMBER =      1295
-
-ARCLEN =  5.48497391970795E+00
-NFE =  401
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99985777764527E-01
-
-X( 1) = (  9.81515877374604E-01, -1.68931382572369E+00)
-X( 2) = (  1.79424904916680E+00, -5.31891874401269E+00)
-X( 3) = (  4.18022011870714E-01,  4.65009652875371E-01)
-X( 4) = (  5.60490138528248E-01,  2.06370219992617E-01)
-
-X( 5) = ( -9.84643590823609E-02, -8.13811094720266E-02)
-
-PATH NUMBER =      1296
-
-ARCLEN =  1.73756889973766E+00
-NFE =  276
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999835E-01
-
-X( 1) = ( -9.10309509651618E+01, -2.31935546250163E+02)
-X( 2) = ( -4.63532689268708E+02, -9.42420980199329E+01)
-X( 3) = (  1.03686559783004E+00, -1.96307641699188E-02)
-X( 4) = (  3.70371720668373E-02, -1.93204264804495E-02)
-
-X( 5) = (  7.36561944456093E-04, -8.38890841269976E-04)
-
-PATH NUMBER =      1297
-
-ARCLEN =  1.32289306530060E+00
-NFE =  312
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98413684380611E-01
-
-X( 1) = (  5.84907854743095E-01, -4.99434569348336E-02)
-X( 2) = ( -5.51496142374838E-01, -1.74209313072410E+00)
-X( 3) = (  7.05000029675133E-01, -2.12972306721795E-02)
-X( 4) = ( -5.32210454497979E-01, -1.22684713431062E-01)
-
-X( 5) = ( -3.51374606680586E-01, -2.05346528704324E-01)
-
-PATH NUMBER =      1298
-
-ARCLEN =  1.66631200549748E+00
-NFE =  464
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99904806258353E-01
-
-X( 1) = (  7.09103637646689E-01,  2.00599901204558E-01)
-X( 2) = (  6.02044359349109E-02, -6.31195355998619E-01)
-X( 3) = (  9.23103996101604E-01, -3.73274709198150E-01)
-X( 4) = ( -2.36993014806289E-01,  5.35372788702435E-01)
-
-X( 5) = ( -3.65756177048098E-01, -4.92134649638159E-02)
-
-PATH NUMBER =      1299
-
-ARCLEN =  1.94328077611918E+00
-NFE =  466
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99847596135438E-01
-
-X( 1) = (  9.83817305759788E-01, -1.97208388650972E-02)
-X( 2) = ( -5.47471538041289E-01, -4.85246132009632E-02)
-X( 3) = (  7.54648470922090E-01, -5.89668312204041E-01)
-X( 4) = (  1.88766126265533E-01,  1.81434711282864E-01)
-
-X( 5) = ( -4.32011742643702E-01, -3.57608241919445E-01)
-
-PATH NUMBER =      1300
-
-ARCLEN =  1.73342065516385E+00
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99319216737324E-01
-
-X( 1) = (  7.77218414744281E-01,  9.39330399310218E-02)
-X( 2) = ( -1.88028950083417E-01, -8.74108160267946E-01)
-X( 3) = (  8.24025017712902E-01, -2.94837336837927E-01)
-X( 4) = ( -3.02731257324544E-01,  8.29019920849206E-02)
-
-X( 5) = ( -3.98773562973597E-01, -1.15140179671667E-01)
-
-PATH NUMBER =      1301
-
-ARCLEN =  7.85716494991173E+00
-NFE =  216
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.72382202328801E-13
-
-X( 1) = (  7.40669386749509E+10, -2.12034631733406E+11)
-X( 2) = (  2.88923446690930E+11, -1.70835408253026E+10)
-X( 3) = (  5.01174546416201E-01,  2.24235145831297E-03)
-X( 4) = ( -6.85011764042769E+10, -1.19906101556387E+11)
-
-X( 5) = ( -4.73810042849604E-12, -8.79528112666950E-13)
-
-PATH NUMBER =      1302
-
-ARCLEN =  9.41370835832263E+01
-NFE =  470
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999841278E-01
-
-X( 1) = ( -1.13766606945839E-01, -5.20272799544255E-02)
-X( 2) = ( -5.15820433552866E+00,  7.97422669421886E-01)
-X( 3) = (  9.23400175141720E-01, -2.27276715745525E-02)
-X( 4) = (  8.98279905507725E+00,  1.96243769298476E+01)
-
-X( 5) = ( -2.08138016419312E-02, -7.47012830592089E-02)
-
-PATH NUMBER =      1303
-
-ARCLEN =  7.14371727925833E+00
-NFE =  579
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99969367374832E-01
-
-X( 1) = (  8.72785006320635E-01,  1.91385122986537E-02)
-X( 2) = (  9.79198664456131E-01, -1.01243176621239E+00)
-X( 3) = ( -3.53479888554417E-02, -1.05027655793498E-01)
-X( 4) = (  2.57077439641468E-01,  3.86055943395297E-01)
-
-X( 5) = ( -4.15531577909401E-01, -2.25161388986170E-02)
-
-PATH NUMBER =      1304
-
-ARCLEN =  4.03574875975571E+00
-NFE =  357
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97530451470689E-01
-
-X( 1) = (  6.62146116556893E-01,  1.62984127569755E-02)
-X( 2) = ( -4.60128338151721E-01, -1.38541220346025E+00)
-X( 3) = (  7.59187871837384E-01, -5.89046109178686E-02)
-X( 4) = ( -4.57397687209448E-01, -1.04704853245110E-01)
-
-X( 5) = ( -3.97031795158536E-01, -1.69105522233518E-01)
-
-PATH NUMBER =      1305
-
-ARCLEN =  2.68014552688417E+00
-NFE =  347
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99996538471770E-01
-
-X( 1) = (  5.28894072835292E-01, -3.42793178941289E-01)
-X( 2) = (  5.41798020250172E-01, -1.76187218311197E+00)
-X( 3) = (  5.25758093796116E-01,  2.27465672639377E-01)
-X( 4) = ( -3.40891460958155E-01,  1.83164269137213E+00)
-
-X( 5) = ( -2.52657144359414E-01, -7.26252939329930E-02)
-
-PATH NUMBER =      1306
-
-ARCLEN =  2.67942095240534E+00
-NFE =  294
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999990258555E-01
-
-X( 1) = (  1.39868533119513E+01, -7.21986407839701E+00)
-X( 2) = (  1.56556290017925E+01, -2.15869237628480E+01)
-X( 3) = (  1.00600221596487E+00,  7.01174708950917E-03)
-X( 4) = ( -1.12005759007861E-02, -4.48830982191795E-03)
-
-X( 5) = ( -1.73937139125912E-02, -9.22341072031899E-03)
-
-PATH NUMBER =      1307
-
-ARCLEN =  1.49208298723324E+00
-NFE =  267
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99871764213184E-01
-
-X( 1) = (  7.77798870079479E-01,  1.03425414054632E-01)
-X( 2) = (  5.63060212489466E-01, -1.27188925615181E+00)
-X( 3) = (  5.41723140292058E-01, -3.72060122829178E-01)
-X( 4) = ( -3.14804140755379E-01,  1.47499205973410E-01)
-
-X( 5) = ( -3.28111764123682E-01, -6.14990111880900E-02)
-
-PATH NUMBER =      1308
-
-ARCLEN =  1.90842958098151E+00
-NFE =  210
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.95988694544688E-12
-
-X( 1) = ( -5.40184567354399E+11, -5.54119881010128E+11)
-X( 2) = (  1.45912550892061E+12,  1.43645424121942E+12)
-X( 3) = ( -1.35412547442404E+12,  4.90839241992543E+11)
-X( 4) = (  4.71553488045554E-01,  1.33918120978680E-01)
-
-X( 5) = (  1.80870292701418E-13,  1.94300088171562E-13)
-
-PATH NUMBER =      1309
-
-ARCLEN =  2.39409472138423E+00
-NFE =  443
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99992709563044E-01
-
-X( 1) = (  1.06552838574402E+00,  1.21118185766568E-01)
-X( 2) = (  2.41048941549376E+00, -5.25552854286078E-01)
-X( 3) = (  3.43911949199129E-01, -6.33539637608831E-02)
-X( 4) = (  3.89904816253293E-02,  7.57932916985032E-02)
-
-X( 5) = ( -2.12481579538628E-01,  8.60044877702429E-02)
-
-PATH NUMBER =      1310
-
-ARCLEN =  2.61292050135339E+00
-NFE =  182
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.72822949207442E-08
-
-X( 1) = ( -1.34320095716382E+07,  1.56512026634645E+08)
-X( 2) = ( -4.98710156995426E+07,  5.17500117369124E+07)
-X( 3) = (  6.87622136920622E-01, -4.53670884202544E-02)
-X( 4) = ( -3.72138593025179E-01,  4.83643931007159E-01)
-
-X( 5) = (  3.03416450953909E-10,  4.65815766813099E-09)
-
-PATH NUMBER =      1311
-
-ARCLEN =  3.62227011318783E+00
-NFE =  283
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.89288029467982E-01
-
-X( 1) = ( -5.86173569861526E-02,  3.03916857962893E-02)
-X( 2) = ( -1.23699042634978E+00, -6.20983474694307E-01)
-X( 3) = (  9.85706832841791E-01,  2.71695934390284E-03)
-X( 4) = ( -1.12192796326795E+00,  1.06269751047203E+00)
-
-X( 5) = ( -8.75465813499953E-01, -2.20277727672614E-01)
-
-PATH NUMBER =      1312
-
-ARCLEN =  3.95694066161897E+00
-NFE =  294
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999991E-01
-
-X( 1) = (  4.29948980236682E+02, -1.02966369509635E+02)
-X( 2) = (  3.65301359550500E+02, -1.05234399546771E+03)
-X( 3) = (  9.91506887282181E-01,  4.73295362654458E-02)
-X( 4) = ( -8.08644578694708E-03,  4.89294123183178E-02)
-
-X( 5) = ( -4.37544744918851E-04, -2.85233576748349E-04)
-
-PATH NUMBER =      1313
-
-ARCLEN =  2.85118490656293E+00
-NFE =  430
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99080807601784E-01
-
-X( 1) = (  5.97724216562895E-01,  2.83891727506955E-02)
-X( 2) = ( -4.07348146100132E-01, -1.51584354479463E+00)
-X( 3) = (  8.41373220530745E-01, -1.72466139019482E-01)
-X( 4) = ( -4.49306718906815E-01, -2.68434868199067E-01)
-
-X( 5) = ( -3.67379639655487E-01, -1.74990580305327E-01)
-
-PATH NUMBER =      1314
-
-ARCLEN =  2.87410796449126E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999990E-01
-
-X( 1) = ( -1.70965313115790E-01, -2.08972576385662E-01)
-X( 2) = (  8.98014239019667E+01, -1.95023177728409E+02)
-X( 3) = (  8.65728833956551E-01, -5.40229153310016E-03)
-X( 4) = ( -1.03183707739233E+00,  1.11042856050246E+00)
-
-X( 5) = ( -3.57253393272929E-03, -1.69037184137873E-03)
-
-PATH NUMBER =      1315
-
-ARCLEN =  1.37268966319808E+00
-NFE =  330
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99542413698012E-01
-
-X( 1) = (  4.63587345533386E-01,  6.33104286900574E-01)
-X( 2) = (  6.34450881607797E-01, -1.31834277770075E+00)
-X( 3) = (  5.68922777614367E-01, -5.88709888444063E-02)
-X( 4) = ( -4.05933688141694E-01, -1.40341919577877E+00)
-
-X( 5) = ( -3.51524471425731E-01,  1.91044036280789E-01)
-
-PATH NUMBER =      1316
-
-ARCLEN =  1.20725972861415E+00
-NFE =  274
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99127355213054E-01
-
-X( 1) = (  5.33982847649095E-01,  6.29403385376566E-01)
-X( 2) = (  5.44476896444576E-01, -8.96166924648637E-01)
-X( 3) = (  6.27365822709773E-01, -2.06236100097488E-01)
-X( 4) = ( -3.26101348932348E-01, -8.15687685658207E-01)
-
-X( 5) = ( -3.64224467124479E-01,  1.71407641037012E-01)
-
-PATH NUMBER =      1317
-
-ARCLEN =  2.45276553704944E+00
-NFE =  275
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999806E-01
-
-X( 1) = ( -1.38251456619563E+01,  8.72278102734776E+01)
-X( 2) = (  1.09245638318035E+00,  5.49123289570346E-03)
-X( 3) = (  7.45124823754043E+01, -7.63676205647056E+01)
-X( 4) = ( -2.76486319713193E-02, -1.03816827714163E-02)
-
-X( 5) = ( -7.72908538003981E-03,  5.77790557104127E-04)
-
-PATH NUMBER =      1318
-
-ARCLEN =  1.60341926448462E+00
-NFE =  285
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998772162392E-01
-
-X( 1) = ( -8.36005796042708E-01,  2.60112815182868E+00)
-X( 2) = (  3.56644596924720E-01,  6.45084990748000E-02)
-X( 3) = (  1.38090714629465E+00, -6.40199218352618E-02)
-X( 4) = (  3.63855207616523E-01, -5.85737776385660E-01)
-
-X( 5) = ( -6.72385667236172E-02,  1.86672317723400E-01)
-
-PATH NUMBER =      1319
-
-ARCLEN =  2.12580290725805E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999994168018E-01
-
-X( 1) = ( -2.40434380736158E+00,  4.77127642690567E+00)
-X( 2) = ( -4.31976420685101E-02,  1.83347282867487E-01)
-X( 3) = (  1.05069413108657E+00,  7.83134123344704E-02)
-X( 4) = (  6.17892102376834E-01, -4.13268162069343E-04)
-
-X( 5) = ( -4.44830476273121E-03,  1.23702852076282E-01)
-
-PATH NUMBER =      1320
-
-ARCLEN =  5.10739894282134E+00
-NFE =  292
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999689E-01
-
-X( 1) = (  1.08595487149697E+00, -7.06367935944396E-02)
-X( 2) = (  1.03061401624006E+01,  8.07122380776699E+00)
-X( 3) = (  8.17315015567446E-02, -4.80735699948891E-02)
-X( 4) = ( -6.64021960304298E+01, -5.28941515495842E+01)
-
-X( 5) = (  1.44293839539302E-03,  1.52795971214873E-02)
-
-PATH NUMBER =      1321
-
-ARCLEN =  4.91541913354477E+00
-NFE =  304
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999868E-01
-
-X( 1) = ( -2.92932302791231E-01, -1.15231655030445E-01)
-X( 2) = (  2.15722593591280E+02,  4.86591585569237E+02)
-X( 3) = (  8.84429135045592E-01, -1.68556625977865E-02)
-X( 4) = ( -6.12525063276867E+01,  3.27736206828546E+01)
-
-X( 5) = (  3.29000724150342E-04,  1.52476953494419E-03)
-
-PATH NUMBER =      1322
-
-ARCLEN =  8.64944975042421E+00
-NFE =  367
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99863969978181E-01
-
-X( 1) = (  3.45656781023570E-01, -4.87729316617754E-01)
-X( 2) = (  1.18724757321768E+00, -8.72038896263523E-01)
-X( 3) = (  5.06595479492877E-01,  4.41944500850001E-02)
-X( 4) = ( -9.76935967513015E-01, -9.77442294666430E-01)
-
-X( 5) = ( -4.12368180050189E-01,  2.18408080588728E-01)
-
-PATH NUMBER =      1323
-
-ARCLEN =  3.40681938611303E+00
-NFE =  313
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999718989800E-01
-
-X( 1) = (  4.56230225882427E-02,  3.26652226113789E-02)
-X( 2) = (  5.08359527325816E+00, -4.38563966258658E+00)
-X( 3) = (  1.04135598649642E+00,  8.92459061771915E-02)
-X( 4) = (  3.65912501639764E+00, -3.71895413240581E+00)
-
-X( 5) = ( -1.66913237323946E-01, -4.10479227136497E-03)
-
-PATH NUMBER =      1324
-
-ARCLEN =  1.88820673063937E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99904925734583E-01
-
-X( 1) = ( -1.95974401864758E-02,  6.69551949021288E-02)
-X( 2) = (  1.17527046448389E+00, -4.73788747091103E-01)
-X( 3) = (  9.23251676302635E-01, -1.27082644754626E-01)
-X( 4) = (  5.58733866478972E-02, -6.56308995578099E-01)
-
-X( 5) = ( -3.49763192355951E-01,  2.51177946710508E-01)
-
-PATH NUMBER =      1325
-
-ARCLEN =  1.36229676396133E+00
-NFE =  375
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99437272713009E-01
-
-X( 1) = (  4.61816019900324E-01,  6.23987716552917E-01)
-X( 2) = (  5.45471443224704E-01, -2.81403500452412E-01)
-X( 3) = (  1.20400541074431E+00, -9.43008852108139E-01)
-X( 4) = ( -3.43164298646611E-01, -7.71641565517441E-01)
-
-X( 5) = ( -3.83275484581082E-01,  9.30218954281731E-02)
-
-PATH NUMBER =      1326
-
-ARCLEN =  4.05411009824484E+00
-NFE =  540
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999997495294E-01
-
-X( 1) = ( -5.85794177870946E+00,  6.31610509728689E+00)
-X( 2) = (  4.57228196718184E-01,  1.02197712599456E-01)
-X( 3) = (  9.23739450755380E+00, -6.64625767084328E+00)
-X( 4) = (  7.67242141504990E-01, -8.71729361916241E-01)
-
-X( 5) = ( -1.17567631085077E-01,  4.09087021865676E-02)
-
-PATH NUMBER =      1327
-
-ARCLEN =  1.80568661649356E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999865469162E-01
-
-X( 1) = (  7.06427643114314E-01,  4.06608314931563E+00)
-X( 2) = (  5.46163217322910E-02,  2.34438792596623E-01)
-X( 3) = (  9.47169311231009E-01,  9.11892656007246E-02)
-X( 4) = (  4.99335165780484E-01, -7.63613577367938E-01)
-
-X( 5) = ( -7.32412552152818E-02,  1.28570263349389E-01)
-
-PATH NUMBER =      1328
-
-ARCLEN =  3.45104634071166E+00
-NFE =  256
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.73513084322714E-12
-
-X( 1) = ( -3.74444825076128E+11, -8.51440928477431E+11)
-X( 2) = (  1.52272283472698E+12, -8.54883804617477E+10)
-X( 3) = ( -9.90442765245784E+11,  7.11849305038752E+11)
-X( 4) = (  4.97836978607550E-01, -1.28157893654552E-03)
-
-X( 5) = (  3.69217352004514E-13,  5.64119063961588E-13)
-
-PATH NUMBER =      1329
-
-ARCLEN =  3.50081100908909E+00
-NFE =  383
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99897395622765E-01
-
-X( 1) = ( -1.61854802575801E+00,  2.74078994008237E-01)
-X( 2) = ( -3.69734910079399E-01, -1.02691799345269E+00)
-X( 3) = (  9.49966531114562E-01, -3.64178944752811E-03)
-X( 4) = ( -1.12200353946257E+00,  9.57625415430073E-01)
-
-X( 5) = ( -1.52783792964628E-01,  7.99394931081527E-01)
-
-PATH NUMBER =      1330
-
-ARCLEN =  4.38388893957796E+00
-NFE =  330
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999977880E-01
-
-X( 1) = ( -2.64870249155132E-02, -3.79765276338490E-04)
-X( 2) = (  1.44008296519697E+02, -4.46959968177464E+01)
-X( 3) = (  9.71361651882270E-01, -1.18153116968779E-03)
-X( 4) = (  5.29713319463462E+01, -5.81118007377614E+01)
-
-X( 5) = ( -6.88139518963319E-03,  3.21000322323095E-03)
-
-PATH NUMBER =      1331
-
-ARCLEN =  9.87757669675260E+00
-NFE =  403
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999989E-01
-
-X( 1) = (  1.36991750204670E-01,  5.14625734860653E-02)
-X( 2) = (  3.59385014908147E+02,  1.29674105036916E+03)
-X( 3) = ( -2.22362690824602E+02, -3.96115055782366E+01)
-X( 4) = (  9.16551871073818E-01,  4.14142066005641E-03)
-
-X( 5) = (  3.31407751320465E-04,  4.87197307168407E-04)
-
-PATH NUMBER =      1332
-
-ARCLEN =  2.51404663637649E+00
-NFE =  335
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99856785102353E-01
-
-X( 1) = ( -3.25492455349993E-01,  1.60444001462730E-01)
-X( 2) = (  9.17489403481586E-01, -7.18807931979181E-01)
-X( 3) = (  8.12023737607229E-01,  7.89777312562302E-02)
-X( 4) = (  2.06721286137054E-01, -4.84619686284420E-01)
-
-X( 5) = ( -3.59663012823936E-01,  3.53020785724041E-01)
-
-PATH NUMBER =      1333
-
-ARCLEN =  2.39557626035001E+00
-NFE =  269
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97111671838118E-01
-
-X( 1) = ( -1.31508901426322E-01,  7.91612808688160E-02)
-X( 2) = (  8.50084034716394E-02, -7.32191513792552E-01)
-X( 3) = (  9.19852300559595E-01,  2.35409483552683E-02)
-X( 4) = (  3.19857034569861E-01, -7.52878593082786E-01)
-
-X( 5) = ( -9.02986305594465E-01,  5.06752837770847E-01)
-
-PATH NUMBER =      1334
-
-ARCLEN =  1.48061975544630E+00
-NFE =  431
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99398685585386E-01
-
-X( 1) = ( -3.59069020123186E-01,  3.76227076552539E-01)
-X( 2) = (  2.13498381379249E-01, -2.55670504608133E-01)
-X( 3) = (  9.81710574995963E-01,  1.08371838401545E-01)
-X( 4) = (  7.44581497600983E-01, -5.82182512499269E-01)
-
-X( 5) = ( -2.61401642562522E-01,  6.39826942373792E-01)
-
-PATH NUMBER =      1335
-
-ARCLEN =  1.70552960990482E+00
-NFE =  164
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.61643782600782E-11
-
-X( 1) = ( -7.31313682040379E+09,  1.10181643203648E+09)
-X( 2) = (  5.03134980751194E-01, -2.91232519524963E-01)
-X( 3) = (  7.95945545250836E+09,  1.03591724629714E+10)
-X( 4) = (  6.36649031190057E+09,  8.54331832569960E+07)
-
-X( 5) = ( -5.36223441951339E-12,  6.32726357202226E-11)
-
-PATH NUMBER =      1336
-
-ARCLEN =  2.20661918735000E+00
-NFE =  323
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999933E-01
-
-X( 1) = ( -2.56334139778282E+01,  9.70900756432562E+01)
-X( 2) = ( -4.22637738422904E-02, -6.81215108345061E-02)
-X( 3) = (  3.85539677792559E+01,  5.98648526140361E-01)
-X( 4) = (  1.00188179476586E+00, -8.34972411324006E-03)
-
-X( 5) = ( -3.12090658326980E-03,  5.70437824501689E-03)
-
-PATH NUMBER =      1337
-
-ARCLEN =  2.74522811829031E+00
-NFE =  427
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99975417273842E-01
-
-X( 1) = ( -1.20626703759255E+00, -1.43689338365362E+00)
-X( 2) = (  5.83258350947252E-01, -4.41838779102524E-01)
-X( 3) = (  4.03581341047431E-01,  1.97536463130134E+00)
-X( 4) = (  5.30267061879204E-01,  2.23542405763688E-01)
-
-X( 5) = (  2.03327288129114E-01,  3.51629480274391E-01)
-
-PATH NUMBER =      1338
-
-ARCLEN =  3.14523613333090E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999985814915E-01
-
-X( 1) = ( -2.15502770041414E+00,  4.58883480263397E+00)
-X( 2) = (  6.30855470856299E-02,  1.30015914717792E-01)
-X( 3) = (  8.05040774046228E-01, -3.23582884716462E-01)
-X( 4) = (  8.89422446708029E-01,  2.25637432762632E-01)
-
-X( 5) = ( -6.59679028229061E-03,  1.42622452039432E-01)
-
-PATH NUMBER =      1339
-
-ARCLEN =  2.62405741307520E+00
-NFE =  389
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98651149606516E-01
-
-X( 1) = ( -3.00494704999863E-01,  2.07121951766544E-01)
-X( 2) = (  4.58478814066498E-01, -5.29417890587437E-01)
-X( 3) = (  7.88526656632877E-01,  3.96067380934269E-02)
-X( 4) = (  4.64435601042578E-01, -5.96161243875548E-01)
-
-X( 5) = ( -4.22607111196587E-01,  6.18857777007016E-01)
-
-PATH NUMBER =      1340
-
-ARCLEN =  6.74441444289709E+00
-NFE =  463
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99693107422223E-01
-
-X( 1) = ( -3.22304996382352E-01, -3.31542183526789E-02)
-X( 2) = (  7.70708802339144E-01, -6.88574354084745E-01)
-X( 3) = (  6.81577759533390E-01,  6.66407061706402E-01)
-X( 4) = (  8.60879735355049E-01, -1.96003106145501E-01)
-
-X( 5) = ( -3.22312116579484E-01,  4.69014061312702E-01)
-
-PATH NUMBER =      1341
-
-ARCLEN =  4.71384325603435E+00
-NFE =  509
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98944363386664E-01
-
-X( 1) = ( -3.02902954651575E-02, -3.51768218235382E-02)
-X( 2) = (  4.39081389240354E-01, -1.02768577988043E+00)
-X( 3) = (  9.75926575391912E-01,  1.02673977835899E-02)
-X( 4) = ( -1.39643675334824E-01, -1.27819324512899E+00)
-
-X( 5) = ( -6.01551915927361E-01,  2.79771893583495E-01)
-
-PATH NUMBER =      1342
-
-ARCLEN =  4.67969185595704E+00
-NFE =  269
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95579137512716E-01
-
-X( 1) = ( -1.72082486637344E-01,  5.73076661096971E-03)
-X( 2) = ( -1.21669919080495E-01, -6.33931289332754E-01)
-X( 3) = (  8.98050329955297E-01,  4.75140010217284E-02)
-X( 4) = (  3.82917506717201E-01, -6.42766263170770E-01)
-
-X( 5) = ( -1.44616334182595E+00,  8.84176229923976E-01)
-
-PATH NUMBER =      1343
-
-ARCLEN =  1.71533923087191E+00
-NFE =  295
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96158480274968E-01
-
-X( 1) = (  6.71401780733933E-02,  1.70889554970711E-01)
-X( 2) = (  1.49580367747485E-01, -1.12838628380494E-01)
-X( 3) = (  8.94619944397999E-01, -1.29411275253434E-02)
-X( 4) = (  2.74680776257137E-01, -5.40743533631196E-01)
-
-X( 5) = ( -4.87926670268971E-01,  5.93997504352861E-01)
-
-PATH NUMBER =      1344
-
-ARCLEN =  1.45877756386224E+00
-NFE =  301
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99243527698945E-01
-
-X( 1) = ( -3.39585645475227E-01,  2.37110356522789E-01)
-X( 2) = (  2.17832225311030E-02,  6.25958826307531E-02)
-X( 3) = (  1.04263767920378E+00,  5.00103723596658E-02)
-X( 4) = (  6.42446163687935E-01, -1.77891600150563E-01)
-
-X( 5) = ( -2.68745432870846E-01,  7.68315191083490E-01)
-
-PATH NUMBER =      1345
-
-ARCLEN =  2.26378610408535E+00
-NFE =  302
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98718405806105E-01
-
-X( 1) = ( -4.84290155942926E-01,  3.70961095155098E-01)
-X( 2) = ( -4.28052036039350E-01, -1.29935611402139E-01)
-X( 3) = (  1.38083157666933E+00,  1.38245968754558E-01)
-X( 4) = (  7.55039032525371E-01, -2.25710299322575E-02)
-
-X( 5) = ( -5.02244867625574E-01,  8.05789766392911E-01)
-
-PATH NUMBER =      1346
-
-ARCLEN =  2.42537435201011E+00
-NFE =  253
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99334467137087E-01
-
-X( 1) = ( -8.39817657054717E-01,  2.65835707188938E-01)
-X( 2) = (  4.67268008021826E-02,  4.75325965330004E-01)
-X( 3) = (  8.58200846905571E-01,  1.15626738604048E-01)
-X( 4) = (  6.43659525187931E-01,  2.04041841170639E-01)
-
-X( 5) = (  1.43154782054388E-01,  4.95032365539940E-01)
-
-PATH NUMBER =      1347
-
-ARCLEN =  2.08905071983414E+00
-NFE =  317
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98319062042474E-01
-
-X( 1) = ( -4.11255158674215E-01,  2.14240311645752E-01)
-X( 2) = (  2.05629322491637E-02, -3.15649054614150E-01)
-X( 3) = (  8.76714918785903E-01,  1.05033388800418E-01)
-X( 4) = (  6.59077617834113E-01, -4.02413913792875E-01)
-
-X( 5) = ( -2.39888999565969E-01,  9.77008419931365E-01)
-
-PATH NUMBER =      1348
-
-ARCLEN =  7.52694116645724E+00
-NFE =  372
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97326294780857E-01
-
-X( 1) = ( -8.55127338907368E-01, -3.55347878451599E-01)
-X( 2) = (  3.79887691335332E-01, -1.53620963118045E+00)
-X( 3) = (  8.16326700365208E-01,  1.57764851372641E+00)
-X( 4) = (  8.64517038853752E-01, -7.47067969263163E-03)
-
-X( 5) = ( -2.81261359227568E-01,  5.34058342852549E-01)
-
-PATH NUMBER =      1349
-
-ARCLEN =  6.51286473517184E+00
-NFE =  162
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.68286217464008E-12
-
-X( 1) = ( -7.04187905252104E+10, -5.49580366885067E+10)
-X( 2) = ( -3.77265694917272E+10, -3.44760107505329E+10)
-X( 3) = (  3.08487176167143E+10,  1.94750203042331E+10)
-X( 4) = (  4.99467470340171E-01,  9.58900396066866E-04)
-
-X( 5) = (  7.46274052211733E-12, -5.77277114999220E-12)
-
-PATH NUMBER =      1350
-
-ARCLEN =  2.14836372327561E+02
-NFE =  470
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.69606791454121E-01
-
-X( 1) = ( -1.82969258529220E-01, -1.99159023051907E-01)
-X( 2) = ( -5.86344354740375E-01, -7.05655295890677E-01)
-X( 3) = (  9.06062089127766E-01,  2.72674031854970E-02)
-X( 4) = ( -5.57696214001753E-02, -6.76453905402678E-01)
-
-X( 5) = ( -3.46861520100757E+00, -4.13940874793607E+00)
-
-PATH NUMBER =      1351
-
-ARCLEN =  4.84053084509582E+01
-NFE =  450
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99558918168216E-01
-
-X( 1) = (  1.32429127763991E-01, -5.48235124576710E-01)
-X( 2) = ( -1.00037018082221E-01, -1.38754503391517E+00)
-X( 3) = (  6.03271569019036E-01,  6.85729327566725E-01)
-X( 4) = (  7.19397082358619E-01, -2.26210874466137E-01)
-
-X( 5) = ( -7.42055233096295E-01, -4.94385056169132E-01)
-
-PATH NUMBER =      1352
-
-ARCLEN =  4.63784758981029E+00
-NFE =  325
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99219250752007E-01
-
-X( 1) = ( -2.80680458859804E-01, -1.57753520117660E-01)
-X( 2) = (  3.50124984263496E-01, -5.40608903059863E-01)
-X( 3) = (  6.54771049633177E-01,  4.79507411277433E-01)
-X( 4) = (  8.43563195568265E-01, -2.16309201466690E-01)
-
-X( 5) = ( -4.77396438539663E-01,  9.36805953554351E-01)
-
-PATH NUMBER =      1353
-
-ARCLEN =  1.96421872507953E+00
-NFE =  264
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97388285287180E-01
-
-X( 1) = ( -9.89095947364412E-02,  1.22848423057263E-01)
-X( 2) = ( -3.77922464583778E-01, -7.90071549707398E-02)
-X( 3) = (  1.00155712342826E+00,  4.70099436120990E-02)
-X( 4) = (  5.57873285583816E-01, -1.70958893292064E-02)
-
-X( 5) = ( -1.09803113980784E+00,  1.13159504917251E+00)
-
-PATH NUMBER =      1354
-
-ARCLEN =  1.70240056835480E+00
-NFE =  305
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.85574254437505E-01
-
-X( 1) = ( -3.80855787060084E-01,  2.35954944392681E-01)
-X( 2) = ( -5.74099385687119E-01,  1.19563709500313E-01)
-X( 3) = (  1.08885094760621E+00,  6.00633091719563E-02)
-X( 4) = (  5.91978125508246E-01,  1.05481684401352E-01)
-
-X( 5) = ( -4.32166877616861E-04,  1.33777242117177E+00)
-
-PATH NUMBER =      1355
-
-ARCLEN =  4.84311687198984E+00
-NFE =  370
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99796332367154E-01
-
-X( 1) = ( -6.85254731445054E-01,  6.08891278246783E-01)
-X( 2) = ( -1.01145060360109E-01,  3.27322889209545E-01)
-X( 3) = (  1.23543498025059E+00, -4.63036946255542E-01)
-X( 4) = (  1.01882178003202E+00,  7.16164677357866E-02)
-
-X( 5) = ( -1.32426565683864E-01,  9.99985190443406E-01)
-
-PATH NUMBER =      1356
-
-ARCLEN =  8.49356911712643E+00
-NFE =  258
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.49224159574091E-12
-
-X( 1) = (  3.38452083506142E+12,  2.92755646966633E+12)
-X( 2) = ( -3.01701543924097E+12,  5.41604106150816E+12)
-X( 3) = (  1.38399945702179E+12, -2.26797195481023E+12)
-X( 4) = (  4.98425474356911E-01, -1.22777455087730E-02)
-
-X( 5) = ( -3.72809611957556E-13,  5.51669929356458E-13)
-
-PATH NUMBER =      1357
-
-ARCLEN =  2.61587498928620E+00
-NFE =  296
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87501803085122E-01
-
-X( 1) = ( -5.66518833515318E-01,  9.62984607907512E-02)
-X( 2) = ( -5.93103344641525E-01, -3.65771890756163E-01)
-X( 3) = (  8.75210440370833E-01,  2.52653289011337E-01)
-X( 4) = (  6.48754097649870E-01, -1.33611229526932E-01)
-
-X( 5) = (  8.91337819161046E-01,  1.22744191445394E+00)
-
-PATH NUMBER =      1358
-
-ARCLEN =  5.43133723744102E+00
-NFE =  214
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.47331273242483E-13
-
-X( 1) = (  2.61636439362129E+11,  3.05436373731387E+11)
-X( 2) = (  4.13353694383540E+11,  8.82413491659785E+10)
-X( 3) = ( -1.67950212033418E+11,  7.19001381906093E+10)
-X( 4) = (  4.99512563485518E-01, -4.68693280579865E-04)
-
-X( 5) = ( -6.58439882478268E-13,  8.36402724423840E-13)
-
-PATH NUMBER =      1359
-
-ARCLEN =  4.35361899028353E+01
-NFE =  431
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997043135046E-01
-
-X( 1) = (  6.16276702213894E-01, -3.40163421642319E-01)
-X( 2) = (  3.23743764449044E-01, -5.15371837684593E+00)
-X( 3) = (  5.18693269821601E-01,  1.31916243072041E-01)
-X( 4) = ( -6.00264424335116E-01, -1.26862955374762E+00)
-
-X( 5) = ( -1.38804780303734E-01, -1.07301486192769E-01)
-
-PATH NUMBER =      1360
-
-ARCLEN =  4.61268646189140E+00
-NFE =  360
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99835097761089E-01
-
-X( 1) = (  6.38109184701448E-01, -2.31697867972054E-01)
-X( 2) = ( -4.78467080927589E-01, -1.79544459735530E+00)
-X( 3) = (  7.78401651925605E-01,  5.16672585548791E-02)
-X( 4) = ( -2.76232028817923E-01, -3.59022812934773E-02)
-
-X( 5) = ( -2.99350704550491E-01, -2.04675936067505E-01)
-
-PATH NUMBER =      1361
-
-ARCLEN =  4.44522635298129E+00
-NFE =  380
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.82572322285497E-01
-
-X( 1) = (  1.65096281093047E-01, -5.89826780852070E-02)
-X( 2) = ( -5.07037507087807E-01, -4.17249054870700E-01)
-X( 3) = (  7.31493985406346E-01,  6.55666177501046E-02)
-X( 4) = (  2.93710915864850E-01, -6.68483713201691E-02)
-
-X( 5) = ( -1.93225487326454E+00, -4.98769276375397E-01)
-
-PATH NUMBER =      1362
-
-ARCLEN =  3.04091878738167E+00
-NFE =  358
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99503897944960E-01
-
-X( 1) = (  3.41429511180812E-01,  4.45066163195270E-02)
-X( 2) = ( -1.57189897161125E-01, -6.13822393037585E-01)
-X( 3) = (  8.95261384933645E-01, -8.02861767642391E-03)
-X( 4) = (  1.81728769144058E-01,  3.30218033113655E-01)
-
-X( 5) = ( -5.85937486952038E-01, -5.79350398904938E-02)
-
-PATH NUMBER =      1363
-
-ARCLEN =  2.61046547051732E+00
-NFE =  347
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92630530251110E-01
-
-X( 1) = ( -3.36767478958399E-02,  1.81463331319456E-01)
-X( 2) = ( -6.52001938979866E-01,  4.83979710850203E-02)
-X( 3) = (  9.90514411508244E-01, -7.46738930854647E-03)
-X( 4) = (  4.44975645532765E-01,  3.58615057468223E-01)
-
-X( 5) = ( -1.61270574800333E+00,  1.09174565432427E+00)
-
-PATH NUMBER =      1364
-
-ARCLEN =  1.85786976266784E+01
-NFE =  272
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.81774715588537E-01
-
-X( 1) = ( -3.84622970307755E-01, -8.97301380881402E-02)
-X( 2) = ( -9.42799524276636E-01,  1.55197431132350E-01)
-X( 3) = (  9.48918563937573E-01,  6.64118665674844E-02)
-X( 4) = (  3.06979331926910E-01,  9.77673228188008E-01)
-
-X( 5) = (  5.01944494746073E+00,  8.10371987157031E-01)
-
-PATH NUMBER =      1365
-
-ARCLEN =  7.40078171259051E+00
-NFE =  395
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999976E-01
-
-X( 1) = (  1.49535119095907E+02, -1.35326398896008E+02)
-X( 2) = ( -2.33139342638250E+00,  3.94557381890749E-03)
-X( 3) = ( -1.88757081753591E+02,  1.77503924854915E+02)
-X( 4) = (  6.30576156726119E-01,  7.18136493555309E-05)
-
-X( 5) = (  7.31392095737595E-03,  6.17317604127819E-05)
-
-PATH NUMBER =      1366
-
-ARCLEN =  1.16387936982539E+01
-NFE =  345
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99893743543071E-01
-
-X( 1) = (  1.96313465915297E-01, -6.52160881810264E-01)
-X( 2) = ( -5.25839735836735E-01, -1.08130976644681E+00)
-X( 3) = (  7.14478629799831E-01, -1.21536006227065E-01)
-X( 4) = (  6.63286534975503E-01,  6.12682241181463E-01)
-
-X( 5) = ( -1.67627383300890E-01, -3.96643457331848E-01)
-
-PATH NUMBER =      1367
-
-ARCLEN =  3.82839206181309E+00
-NFE =  133
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.15672967693277E-14
-
-X( 1) = ( -1.78798146612411E+14,  7.17364932344860E+13)
-X( 2) = ( -4.44745336474980E+14,  1.26774481060321E+14)
-X( 3) = (  2.52777564819247E+14, -4.15273105782798E+13)
-X( 4) = (  4.37843264870105E-01, -1.15468250074645E-02)
-
-X( 5) = (  2.70302443622361E-15, -8.18681060443804E-16)
-
-PATH NUMBER =      1368
-
-ARCLEN =  8.69584570547983E+00
-NFE =  382
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972147565746E-01
-
-X( 1) = (  5.78383187148866E-01, -1.40400679115156E+00)
-X( 2) = (  3.14343674376588E-01, -1.85726557512550E+00)
-X( 3) = (  4.53995748015353E-01,  6.44312258985493E-01)
-X( 4) = (  5.27234540318323E-01, -3.68703477656234E-02)
-
-X( 5) = ( -2.38722176665611E-01, -2.90022894329870E-01)
-
-PATH NUMBER =      1369
-
-ARCLEN =  2.13674547679344E+00
-NFE =  122
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99912453240486E-01
-
-X( 1) = (  9.21916123497214E-01, -1.39648177142456E+00)
-X( 2) = ( -5.16901478487706E-01, -2.82462499632681E+00)
-X( 3) = (  6.13971194297292E-01,  3.89929996292227E-01)
-X( 4) = (  4.11730673850765E-01,  1.88007872205038E-01)
-
-X( 5) = ( -1.07782621947922E-01, -1.79688259560371E-01)
-
-PATH NUMBER =      1370
-
-ARCLEN =  1.71142315782704E+00
-NFE =  357
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99691051559160E-01
-
-X( 1) = (  7.73630959973612E-01, -2.79808345328592E-02)
-X( 2) = (  3.98375101915411E-02, -9.54622532660252E-01)
-X( 3) = (  7.72231214768427E-01, -1.01328030653380E-01)
-X( 4) = ( -1.35605605781142E-01,  1.21389603622616E-01)
-
-X( 5) = ( -3.91796431544856E-01, -8.92771043467273E-02)
-
-PATH NUMBER =      1371
-
-ARCLEN =  3.07103530908549E+00
-NFE =  434
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99883940433151E-01
-
-X( 1) = (  6.26398653828964E-02,  3.28303893386154E-03)
-X( 2) = ( -7.07675502422641E-01, -4.51712821804765E-01)
-X( 3) = (  7.86506743644481E-01, -6.24336822958556E-02)
-X( 4) = (  8.82687179675411E-01,  5.29628223246930E-01)
-
-X( 5) = ( -5.16291654895309E-01, -9.21875750155575E-01)
-
-PATH NUMBER =      1372
-
-ARCLEN =  3.90150514000516E+00
-NFE =  252
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999920E-01
-
-X( 1) = (  5.96646218523631E-02,  5.49728431187489E-02)
-X( 2) = ( -4.00099952304058E+00, -3.12146034633306E+01)
-X( 3) = (  1.05260952642663E+00,  6.06490239826944E-02)
-X( 4) = (  6.35182785339839E+01,  1.32416831409974E+02)
-
-X( 5) = ( -4.80104814961664E-03, -6.42975114151321E-03)
-
-PATH NUMBER =      1373
-
-ARCLEN =  4.30899788964726E+01
-NFE =  383
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.95809498441734E-11
-
-X( 1) = (  5.81611690731722E+09, -3.85791043561960E+09)
-X( 2) = (  7.71468416143103E+09,  1.90109157305363E+10)
-X( 3) = (  5.07307303607371E-01,  5.62767801321257E-03)
-X( 4) = ( -1.38832476048651E+10, -1.30841858116792E+10)
-
-X( 5) = (  7.68635399469100E-12,  3.71101235136471E-11)
-
-PATH NUMBER =      1374
-
-ARCLEN =  1.72242864425974E+01
-NFE =  404
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.90898234562754E-08
-
-X( 1) = ( -1.17409337942092E+07,  7.11508989825110E+07)
-X( 2) = (  2.27305449184712E+08,  4.91208847840704E+08)
-X( 3) = (  5.25742758191030E-01,  1.60739648363025E-02)
-X( 4) = ( -1.00464459140966E+07,  2.73707568756613E+06)
-
-X( 5) = (  2.52291408549049E-10,  1.35064430272598E-09)
-
-PATH NUMBER =      1375
-
-ARCLEN =  1.30882684437723E+01
-NFE =  472
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99953638937512E-01
-
-X( 1) = (  5.08713184018040E-01, -2.18456492773273E-01)
-X( 2) = (  2.46237951222199E-01, -2.33813569568852E+00)
-X( 3) = (  7.10633595312326E-01,  2.10390874329794E-01)
-X( 4) = ( -2.16646925034734E-01,  4.70329658004263E-01)
-
-X( 5) = ( -2.55876830181583E-01, -1.03852430544970E-01)
-
-PATH NUMBER =      1376
-
-ARCLEN =  5.75401773040402E+00
-NFE =  302
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90577707650672E-01
-
-X( 1) = (  5.53755050895062E-01, -9.00304810128135E-02)
-X( 2) = ( -8.40366173897610E-01, -5.21520868854680E-01)
-X( 3) = (  7.01599940859529E-01,  7.47137182069146E-02)
-X( 4) = ( -3.98483436051910E-01, -7.95273341617672E-02)
-
-X( 5) = ( -9.97749761381118E-01, -3.84749678465761E-01)
-
-PATH NUMBER =      1377
-
-ARCLEN =  2.11818561761671E+00
-NFE =  143
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.91693259156209E-14
-
-X( 1) = (  7.66907434780718E+10, -4.04994427266678E+12)
-X( 2) = ( -3.44463073450685E+12, -8.60951867046186E+12)
-X( 3) = (  1.80885219367890E+12,  3.10694588705023E+12)
-X( 4) = (  4.95637867493626E-01, -8.11740025456190E-04)
-
-X( 5) = ( -2.68124281457838E-14, -7.88334783737021E-14)
-
-PATH NUMBER =      1378
-
-ARCLEN =  1.55894271795321E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99917066433666E-01
-
-X( 1) = (  7.42257712513124E-01, -2.21117406840399E-01)
-X( 2) = (  1.53739509144679E-02, -2.28742884173440E+00)
-X( 3) = (  6.52861901505693E-01,  6.48132295204085E-01)
-X( 4) = (  8.07986016519481E-02, -3.02610276919762E-01)
-
-X( 5) = ( -3.13844900236464E-01, -1.06485348580488E-01)
-
-PATH NUMBER =      1379
-
-ARCLEN =  3.19139049201605E+00
-NFE =  284
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999996173E-01
-
-X( 1) = (  6.04593902927200E-01,  7.79415386167038E-01)
-X( 2) = ( -8.46644946869480E+00, -4.75584197369390E+01)
-X( 3) = (  5.00066843942655E-01, -4.78049566861778E-02)
-X( 4) = (  4.18279878477321E-01, -7.08515736729369E-01)
-
-X( 5) = ( -9.22156606972100E-03, -1.52859401780769E-02)
-
-PATH NUMBER =      1380
-
-ARCLEN =  1.33392825541913E+00
-NFE =  320
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99897595604480E-01
-
-X( 1) = (  8.82369708161371E-01,  2.49814525765599E-01)
-X( 2) = (  4.51921038788331E-03, -8.41120354096520E-01)
-X( 3) = (  9.50490530829634E-01,  2.65657260406962E-01)
-X( 4) = ( -9.16728467183989E-03,  1.56294222816898E-01)
-
-X( 5) = ( -3.48281501286496E-01,  2.76568144788060E-02)
-
-PATH NUMBER =      1381
-
-ARCLEN =  1.72177505385240E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997208777093E-01
-
-X( 1) = (  1.71959498056296E+00,  1.20834050739969E+00)
-X( 2) = ( -2.88881345202482E-01, -6.99727226008934E-02)
-X( 3) = (  1.00799136192222E+00, -1.85399339170072E-03)
-X( 4) = (  1.95667768139700E-01,  2.47024018953586E-01)
-
-X( 5) = ( -2.56914201292478E-01,  6.62532771803865E-02)
-
-PATH NUMBER =      1382
-
-ARCLEN =  4.19278587944578E+00
-NFE =  330
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99688731876627E-01
-
-X( 1) = (  5.38727839010631E-01, -2.25842101049053E-01)
-X( 2) = ( -4.73586149224589E-01,  1.56749255527611E+00)
-X( 3) = (  2.36461945072629E-01, -2.11696490735588E+00)
-X( 4) = (  6.12556883517326E-01,  2.90593485423874E-01)
-
-X( 5) = (  2.38082164538789E-01, -3.53462483893474E-01)
-
-PATH NUMBER =      1383
-
-ARCLEN =  4.24032183270186E+00
-NFE =  257
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999843E-01
-
-X( 1) = (  9.09043752839559E-01,  1.75275881223478E-03)
-X( 2) = ( -5.40795390961964E+02, -9.77972686057606E+02)
-X( 3) = (  5.31423539442279E+02,  2.97298911863940E+02)
-X( 4) = (  6.45908649685270E-02,  1.47645195251978E-02)
-
-X( 5) = ( -5.43418428941713E-04, -5.02468052154379E-04)
-
-PATH NUMBER =      1384
-
-ARCLEN =  9.54267540324959E+01
-NFE =  524
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999987371E-01
-
-X( 1) = ( -8.32927717133366E-02, -5.38892380238066E-02)
-X( 2) = ( -6.10829547998393E+00,  2.00560189573712E+00)
-X( 3) = (  9.36788809613541E-01, -2.76030944853044E-02)
-X( 4) = (  1.59891697107557E+01,  2.97302762266888E+01)
-
-X( 5) = ( -1.41912476908404E-02, -4.99322655981277E-02)
-
-PATH NUMBER =      1385
-
-ARCLEN =  6.78642807945248E+00
-NFE =  496
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90831570346507E-01
-
-X( 1) = (  6.72168947000559E-01, -2.04278791216148E-01)
-X( 2) = ( -8.63261000530029E-01, -7.82348647590015E-01)
-X( 3) = (  6.51711603803749E-01,  9.45941002446737E-02)
-X( 4) = ( -1.29394769056482E+00, -8.09795815975815E-02)
-
-X( 5) = ( -7.29853599450967E-01, -1.61891946160123E-01)
-
-PATH NUMBER =      1386
-
-ARCLEN =  4.95365203742237E+00
-NFE =  494
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99146922306521E-01
-
-X( 1) = (  8.72657259860340E-01, -2.04255150122995E-01)
-X( 2) = (  8.88832931704075E-01, -1.22368874761496E+00)
-X( 3) = ( -1.39493916743924E+00, -6.64744264237713E-01)
-X( 4) = (  2.38176723343076E-01,  1.04952223477917E-01)
-
-X( 5) = ( -1.82224915576959E-01, -7.48112868969890E-01)
-
-PATH NUMBER =      1387
-
-ARCLEN =  2.73961851199221E+00
-NFE =  423
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999876869031E-01
-
-X( 1) = (  1.04166564847032E+00,  6.61816605829331E-02)
-X( 2) = (  7.00291347842860E+00, -5.16081941444750E+00)
-X( 3) = (  3.96930652567088E-02,  2.69115350720290E-02)
-X( 4) = (  4.10972737166197E+00, -4.03951575268411E+00)
-
-X( 5) = ( -1.26443470097723E-01, -1.51897188504724E-03)
-
-PATH NUMBER =      1388
-
-ARCLEN =  1.58191208343822E+00
-NFE =  521
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99685725640783E-01
-
-X( 1) = (  6.18603028656716E-01,  4.11149764613872E-01)
-X( 2) = ( -2.51555673233904E-01, -7.58031454309525E-01)
-X( 3) = (  7.43679122317334E-01, -1.05894971622074E-01)
-X( 4) = (  1.63004322112680E-02, -3.05410390489937E-01)
-
-X( 5) = ( -5.68523276005089E-01,  2.40437789497449E-02)
-
-PATH NUMBER =      1389
-
-ARCLEN =  1.21374813648304E+00
-NFE =  413
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99889521101929E-01
-
-X( 1) = (  5.99437075459610E-01,  5.84480780792107E-01)
-X( 2) = (  2.60594811910433E-01, -7.63889775631413E-01)
-X( 3) = (  9.26607815433606E-01, -7.98176578214225E-02)
-X( 4) = ( -1.22782542718894E-01, -1.60758121943332E-01)
-
-X( 5) = ( -3.48589366274222E-01,  9.69613150056845E-02)
-
-PATH NUMBER =      1390
-
-ARCLEN =  1.77625548578452E+00
-NFE =  371
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999693E-01
-
-X( 1) = (  4.51205377362049E+00,  1.46370206617657E+01)
-X( 2) = (  4.63485592449219E-01, -2.87004064696783E-01)
-X( 3) = (  9.94129311504613E-01,  1.63586278265439E-02)
-X( 4) = ( -9.13541345528032E-03,  2.29237234852359E-02)
-
-X( 5) = ( -2.95575014687929E-02,  3.23805920390280E-02)
-
-PATH NUMBER =      1391
-
-ARCLEN =  1.79882354262312E+00
-NFE =  371
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99960264456806E-01
-
-X( 1) = (  5.60634692806240E-01,  1.58060312582832E-01)
-X( 2) = (  4.41536727388449E-02, -1.94671615276470E-01)
-X( 3) = (  9.45188372734166E-01,  1.21863975275172E-02)
-X( 4) = ( -7.35201548054640E-01,  1.15105230820174E+00)
-
-X( 5) = ( -3.53971425842193E-01,  9.04625036637165E-02)
-
-PATH NUMBER =      1392
-
-ARCLEN =  1.90249736425264E+01
-NFE =  493
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99891024586259E-01
-
-X( 1) = (  9.46885384846076E-02,  6.11706484176108E-01)
-X( 2) = ( -1.74523649854298E-01, -2.11735389564515E+00)
-X( 3) = (  8.54277456151757E-01, -1.78190528796501E-03)
-X( 4) = ( -5.91040123127616E-01,  3.08546337736775E-01)
-
-X( 5) = ( -3.36772430967218E-01, -2.97117238615547E-02)
-
-PATH NUMBER =      1393
-
-ARCLEN =  2.25662122449117E+00
-NFE =  315
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99756427466262E-01
-
-X( 1) = (  5.49895342378448E-01,  5.53180130143214E-01)
-X( 2) = (  5.96094407371196E-01, -9.37826453378249E-01)
-X( 3) = (  7.22683637229355E-01, -5.54726627927905E-02)
-X( 4) = ( -4.08843143232312E-01, -1.54142253951557E-01)
-
-X( 5) = ( -3.13572182086410E-01,  1.13509836947476E-01)
-
-PATH NUMBER =      1394
-
-ARCLEN =  3.09065832972495E+00
-NFE =  358
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99963925676304E-01
-
-X( 1) = (  5.37349607545375E-01,  1.11543231666669E-02)
-X( 2) = (  1.06790619685557E-01, -3.94875924472620E-01)
-X( 3) = (  1.04694333634052E+00, -1.36166560603312E-01)
-X( 4) = ( -2.09283472801897E+00,  2.63989726540246E-01)
-
-X( 5) = ( -3.09937912051489E-01,  1.26025830145544E-01)
-
-PATH NUMBER =      1395
-
-ARCLEN =  1.82447649118957E+00
-NFE =  331
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99774232006347E-01
-
-X( 1) = (  5.48002572770879E-01, -1.21394717600546E-01)
-X( 2) = (  8.50177005389793E-01, -1.20297515362053E+00)
-X( 3) = (  4.79315776675697E-01,  6.34934182159196E-01)
-X( 4) = ( -1.75786964326130E-01, -9.59254538825553E-01)
-
-X( 5) = ( -3.63137046922232E-01,  2.04587427076613E-01)
-
-PATH NUMBER =      1396
-
-ARCLEN =  2.37998387677943E+00
-NFE =  253
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999984E-01
-
-X( 1) = (  1.81086444617963E-02,  4.36099661939805E-02)
-X( 2) = (  1.07149184449410E+03, -5.47818916528320E+02)
-X( 3) = (  1.01657507079488E+00,  4.43719231097758E-02)
-X( 4) = (  3.14039333280589E+02, -3.92378505582615E+02)
-
-X( 5) = ( -8.75172231085732E-04,  1.98227895749400E-04)
-
-PATH NUMBER =      1397
-
-ARCLEN =  1.36446476775944E+00
-NFE =  311
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93036267001411E-01
-
-X( 1) = (  5.96342769044036E-01,  2.21546553630604E-01)
-X( 2) = (  5.55067309027631E-01, -3.11074715587326E-01)
-X( 3) = (  6.25630201426644E-01, -2.14965739799737E-01)
-X( 4) = ( -2.75726774816273E-01, -3.08353806510837E-01)
-
-X( 5) = ( -4.30940258873259E-01,  1.95213721348879E-01)
-
-PATH NUMBER =      1398
-
-ARCLEN =  1.17387095002889E+00
-NFE =  306
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98658884449067E-01
-
-X( 1) = (  4.59003597224090E-01,  4.15778154669967E-01)
-X( 2) = (  3.06184333978906E-01, -2.03962978465048E-01)
-X( 3) = (  9.44536648356788E-01,  2.36147671561847E-02)
-X( 4) = ( -1.91040310093346E-01, -3.35018546190347E-01)
-
-X( 5) = ( -3.41946273523269E-01,  2.37908480481278E-01)
-
-PATH NUMBER =      1399
-
-ARCLEN =  1.69975961567872E+00
-NFE =  342
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999815311293E-01
-
-X( 1) = ( -2.39931001752123E-01,  2.38813648413784E+00)
-X( 2) = (  4.52752463732149E-01, -3.15771869087596E-01)
-X( 3) = (  1.12331446449565E+00,  1.23799699389642E-01)
-X( 4) = (  1.17473559607476E-01,  1.81257923769136E-01)
-
-X( 5) = ( -1.15382393058013E-01,  1.64968316938208E-01)
-
-PATH NUMBER =      1400
-
-ARCLEN =  2.90344380146911E+00
-NFE =  369
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999989597E-01
-
-X( 1) = ( -1.89168169828509E-02,  9.11902194017294E-02)
-X( 2) = (  5.18403709420398E-01, -3.30683744214788E-01)
-X( 3) = (  1.00042659795773E+00,  8.96652837070896E-02)
-X( 4) = ( -4.67526533572428E+00,  9.40905084225310E+00)
-
-X( 5) = ( -1.22982208437602E-01,  1.75006543758800E-02)
-
-PATH NUMBER =      1401
-
-ARCLEN =  1.09798642406243E+01
-NFE =  459
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94012197970908E-01
-
-X( 1) = ( -9.57386468349409E-01,  7.01112030089723E-01)
-X( 2) = ( -1.20371633533304E+00, -1.58004350877085E+00)
-X( 3) = (  8.57358729667748E-01,  8.04148874092889E-03)
-X( 4) = ( -6.45144272997430E-01, -2.18284915539976E-01)
-
-X( 5) = ( -6.49249824056658E-01,  2.83550309785432E+00)
-
-PATH NUMBER =      1402
-
-ARCLEN =  1.95196155376359E+00
-NFE =  302
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99518039197173E-01
-
-X( 1) = (  1.42629153658545E-01,  5.81796438173577E-01)
-X( 2) = (  9.84176114327292E-01, -5.61437932997026E-01)
-X( 3) = (  6.81128494678208E-01,  4.13055777528601E-01)
-X( 4) = (  7.16707828523022E-02, -4.38289504041371E-01)
-
-X( 5) = ( -2.08407836519322E-01,  2.37757376344074E-01)
-
-PATH NUMBER =      1403
-
-ARCLEN =  3.12567701729205E+00
-NFE =  439
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95873622368606E-01
-
-X( 1) = (  6.54975977983595E-01, -1.41129096151807E-01)
-X( 2) = (  1.01652743268751E+00,  1.46850737340197E+00)
-X( 3) = ( -6.56039694017434E-01, -2.97703036579422E-01)
-X( 4) = (  5.09165400488473E-01,  3.44797448907264E-01)
-
-X( 5) = (  2.12533764880997E-01,  4.91150337059896E-01)
-
-PATH NUMBER =      1404
-
-ARCLEN =  1.88447683661824E+00
-NFE =  144
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.12695254342722E-14
-
-X( 1) = (  4.47392068767159E-01, -2.65002059281018E-02)
-X( 2) = (  2.11902056676137E+14, -2.64148185892767E+14)
-X( 3) = ( -1.43167537508074E+13,  1.68077882444552E+14)
-X( 4) = (  5.19082636818566E+11, -1.49363341852414E+14)
-
-X( 5) = ( -2.36824991041440E-15,  1.50178263921830E-15)
-
-PATH NUMBER =      1405
-
-ARCLEN =  1.93460644025759E+00
-NFE =  380
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99927329099899E-01
-
-X( 1) = (  3.48953002930632E-01, -5.88424928505275E-02)
-X( 2) = (  1.73069685682273E+00, -9.66092004075106E-01)
-X( 3) = (  4.99513757147369E-01,  6.29769101807580E-01)
-X( 4) = (  3.60984977922105E-01, -9.23151771270381E-01)
-
-X( 5) = ( -2.52486705764366E-01,  2.04037454788076E-01)
-
-PATH NUMBER =      1406
-
-ARCLEN =  1.39396461045424E+00
-NFE =  482
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98052998490946E-01
-
-X( 1) = (  7.10022797012184E-02,  3.92339553727129E-01)
-X( 2) = (  6.91500720272313E-01, -2.72872416930003E-01)
-X( 3) = (  7.46639738315430E-01,  1.85130926334199E-01)
-X( 4) = ( -4.27016635887155E-01, -3.83620934299053E-01)
-
-X( 5) = ( -2.23633227069553E-01,  2.92908770219215E-01)
-
-PATH NUMBER =      1407
-
-ARCLEN =  2.45741781686360E+00
-NFE =  266
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.14199317268753E-05
-
-X( 1) = (  2.25943420594928E+05,  1.37918750272452E+05)
-X( 2) = ( -2.15108729796627E+00,  1.26866298911130E+00)
-X( 3) = (  8.74365179720334E-01, -1.93402394044614E-02)
-X( 4) = ( -2.83534291033398E-01, -2.50565297051305E-02)
-
-X( 5) = ( -2.72351934830497E-06,  3.62870941921130E-07)
-
-PATH NUMBER =      1408
-
-ARCLEN =  1.27683363992662E+00
-NFE =  391
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97054675535695E-01
-
-X( 1) = ( -2.40501336465241E-01,  6.45180297684974E-01)
-X( 2) = (  5.83923482983867E-01, -1.42812482366888E-01)
-X( 3) = (  1.11455586505058E+00,  4.00503607133624E-01)
-X( 4) = ( -3.82009498118864E-02, -4.89989925722985E-01)
-
-X( 5) = ( -1.53652657051231E-01,  2.73980419721804E-01)
-
-PATH NUMBER =      1409
-
-ARCLEN =  2.26783369014974E+00
-NFE =  359
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999997143E-01
-
-X( 1) = ( -5.91536911319023E+00,  9.55418821501327E+00)
-X( 2) = (  4.64838296512365E-01, -2.88389694309618E-01)
-X( 3) = (  1.00363067024414E+00,  2.38785078613009E-02)
-X( 4) = (  5.84920619390885E-03,  3.56037138429812E-02)
-
-X( 5) = (  2.05372608935867E-03,  6.15130242754602E-02)
-
-PATH NUMBER =      1410
-
-ARCLEN =  2.08198577821381E+00
-NFE =  485
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99718502660231E-01
-
-X( 1) = ( -1.69873994285577E-01,  3.45204216121205E-01)
-X( 2) = (  7.53795706861359E-01, -3.37900212908071E-01)
-X( 3) = (  8.50336888279546E-01,  7.10713671476545E-02)
-X( 4) = ( -2.21916286638112E-01, -3.13437397241425E-01)
-
-X( 5) = ( -2.52982781255293E-01,  3.16735285871795E-01)
-
-PATH NUMBER =      1411
-
-ARCLEN =  8.09766422684164E+00
-NFE =  557
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99298244602436E-01
-
-X( 1) = ( -1.56315857981966E+00,  9.63557029436185E-01)
-X( 2) = ( -1.50121761527711E+00, -1.69431425333145E+00)
-X( 3) = (  8.72859771733039E-01,  6.92748041277171E-03)
-X( 4) = ( -6.87627486829502E-01,  3.79545471508639E-01)
-
-X( 5) = (  8.76515329672021E-01,  1.26250508753197E+00)
-
-PATH NUMBER =      1412
-
-ARCLEN =  2.26050911410393E+00
-NFE =  375
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99909578796834E-01
-
-X( 1) = ( -1.64185598688990E-01, -3.09569086524050E-01)
-X( 2) = (  7.70666818869695E-01, -1.83783376315214E-01)
-X( 3) = (  6.03930448026669E-01,  4.92545642465818E-01)
-X( 4) = ( -6.50905081118009E-01, -5.85496276493121E-01)
-
-X( 5) = ( -1.43735850600573E-01,  4.15664304803327E-01)
-
-PATH NUMBER =      1413
-
-ARCLEN =  2.33841667445834E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99989491125717E-01
-
-X( 1) = (  1.18308715564462E-01,  8.02676568540684E-02)
-X( 2) = (  9.90722141369040E-01, -5.28501163338784E-01)
-X( 3) = (  9.19108594542088E-01,  4.67289723228676E-02)
-X( 4) = ( -3.64446620961729E-01, -6.08514182293792E-03)
-
-X( 5) = ( -3.10961498525543E-01,  1.80199236472680E-01)
-
-PATH NUMBER =      1414
-
-ARCLEN =  1.56562458788132E+00
-NFE =  472
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98285649295190E-01
-
-X( 1) = (  1.22156970363753E-01,  3.36367018540018E-01)
-X( 2) = (  6.18385314267488E-01, -4.83965227054138E-01)
-X( 3) = (  8.92952510939576E-01,  3.44713890629158E-01)
-X( 4) = ( -1.58893797279944E-01, -1.05079482146802E+00)
-
-X( 5) = ( -2.33765643806550E-01,  3.09431471868723E-01)
-
-PATH NUMBER =      1415
-
-ARCLEN =  1.21656833991835E+00
-NFE =  353
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97771782034120E-01
-
-X( 1) = (  1.09234523844234E-01,  3.93519451057585E-01)
-X( 2) = (  6.54208463184538E-01, -5.90837813960826E-01)
-X( 3) = (  8.49222193920064E-01,  3.76405952535932E-01)
-X( 4) = (  9.54735100206285E-02, -8.73616291691427E-01)
-
-X( 5) = ( -2.56025960204396E-01,  2.99245525347250E-01)
-
-PATH NUMBER =      1416
-
-ARCLEN =  1.73899738952316E+00
-NFE =  354
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.48016927784402E-08
-
-X( 1) = ( -2.05289712405889E+06, -5.83805072416315E+06)
-X( 2) = (  1.20870300886058E+00, -2.11741330297550E-04)
-X( 3) = ( -1.05647299324210E+07, -1.42719982728785E+06)
-X( 4) = (  7.34011750445787E-02,  2.48114118506122E-03)
-
-X( 5) = (  4.32424056734685E-08, -1.58345587184298E-08)
-
-PATH NUMBER =      1417
-
-ARCLEN =  1.91336370316915E+00
-NFE =  400
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96217909585878E-01
-
-X( 1) = (  2.33911713797615E-01,  1.25387397732606E-01)
-X( 2) = ( -3.82050526383139E-01,  2.35321720413363E-01)
-X( 3) = (  9.95718616898748E-01,  7.15383242011166E-02)
-X( 4) = (  2.27009171382940E-01,  3.63146150464694E-01)
-
-X( 5) = ( -7.18010867536535E-01,  5.24476221084857E-01)
-
-PATH NUMBER =      1418
-
-ARCLEN =  2.98756913444637E+00
-NFE =  301
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.22466271280004E-08
-
-X( 1) = (  2.86968293490413E+06,  6.04655994116249E+06)
-X( 2) = (  1.13495909247294E+00,  2.39271440388176E-02)
-X( 3) = (  1.47286624478448E+07, -5.07513904063429E+06)
-X( 4) = ( -4.08028582780206E-02, -3.82285168496941E-04)
-
-X( 5) = ( -3.71077046110039E-08, -2.63780716529532E-09)
-
-PATH NUMBER =      1419
-
-ARCLEN =  1.83133595332126E+00
-NFE =  428
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95842248302955E-01
-
-X( 1) = (  1.56016695801728E-01,  3.02365758061852E-01)
-X( 2) = (  1.47805678805695E-01, -3.66186582027660E-01)
-X( 3) = (  9.18460607352738E-01,  4.61080650998697E-04)
-X( 4) = (  1.54947137946965E-01, -5.34179143633025E-01)
-
-X( 5) = ( -4.97592253685844E-01,  3.80538277558858E-01)
-
-PATH NUMBER =      1420
-
-ARCLEN =  4.59811765923986E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999220863E-01
-
-X( 1) = ( -3.32974999979933E-03, -1.67662164508245E-02)
-X( 2) = (  1.04853470549594E+00,  5.16206073141104E-02)
-X( 3) = ( -2.08242976914208E-02,  1.29265665533233E+01)
-X( 4) = (  4.06668210648935E+00,  9.18902169086032E+00)
-
-X( 5) = ( -2.08596174203717E-02,  6.04845044024437E-02)
-
-PATH NUMBER =      1421
-
-ARCLEN =  8.41392239061728E+00
-NFE =  390
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92602740421185E-01
-
-X( 1) = (  6.52167527086361E-01,  8.62701091916899E-02)
-X( 2) = ( -6.78630520515006E-01, -6.46735034167227E-01)
-X( 3) = (  7.13972689799677E-01, -1.99448224908835E-01)
-X( 4) = ( -1.40830627019911E+00, -3.34103023849087E-01)
-
-X( 5) = ( -6.79210207732680E-01,  3.24788322814272E-02)
-
-PATH NUMBER =      1422
-
-ARCLEN =  2.17211964863184E+00
-NFE =  368
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99868751348381E-01
-
-X( 1) = (  5.75628586461838E-02,  3.75057210193273E-02)
-X( 2) = (  6.88296874133839E-01, -3.85042951144145E-01)
-X( 3) = (  9.64378552419950E-01, -3.35950192299452E-02)
-X( 4) = ( -8.70200344393091E-01, -5.94175440101061E-01)
-
-X( 5) = ( -3.11355768848653E-01,  2.74923629388191E-01)
-
-PATH NUMBER =      1423
-
-ARCLEN =  3.36280545018076E+00
-NFE =  273
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999520E-01
-
-X( 1) = (  5.00724327126085E-01, -2.12234971069561E-02)
-X( 2) = ( -3.03637839285168E+00, -6.78889168298219E+01)
-X( 3) = (  5.51442329196100E-01,  7.80778439423234E-01)
-X( 4) = (  4.66918252455359E-01, -7.55200154417274E-01)
-
-X( 5) = ( -7.81263094407406E-03, -9.98619133390869E-03)
-
-PATH NUMBER =      1424
-
-ARCLEN =  1.49573740731743E+00
-NFE =  270
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96046489711611E-01
-
-X( 1) = (  2.62227727287592E-02, -1.57868115865773E-01)
-X( 2) = (  7.60116187840225E-01, -6.81771239969574E-02)
-X( 3) = (  3.35635946007990E-01,  2.79072676159794E-01)
-X( 4) = (  3.13223711416817E-01, -4.21540921183152E-01)
-
-X( 5) = ( -1.72878278784825E-01,  6.20025008450512E-01)
-
-PATH NUMBER =      1425
-
-ARCLEN =  1.53806158231517E+00
-NFE =  469
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99550118822113E-01
-
-X( 1) = ( -2.25697298040203E-01,  2.44326835928905E-01)
-X( 2) = (  4.02129710361039E-01, -2.24485695384097E-01)
-X( 3) = (  1.03513216179517E+00,  1.58261779598328E-01)
-X( 4) = (  4.96925139298244E-01, -4.93211044776229E-01)
-
-X( 5) = ( -3.22271978095794E-01,  4.74453055232083E-01)
-
-PATH NUMBER =      1426
-
-ARCLEN =  1.53659585784276E+00
-NFE =  427
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99482737304673E-01
-
-X( 1) = ( -4.44996184061731E-02,  2.41320885708909E-01)
-X( 2) = (  7.55998725637209E-01,  3.01108596058561E-01)
-X( 3) = (  8.20651982834698E-01,  6.59969903502090E-03)
-X( 4) = ( -2.33330772412193E-02, -2.86544912601862E-01)
-
-X( 5) = ( -1.92474875321342E-01,  3.76014571267768E-01)
-
-PATH NUMBER =      1427
-
-ARCLEN =  2.22835653781506E+00
-NFE =  367
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99196660959590E-01
-
-X( 1) = ( -5.06947696904224E-01,  3.06630256510988E-01)
-X( 2) = ( -2.60452763667656E-02, -1.37229291553087E-01)
-X( 3) = (  8.22834281758225E-01,  1.17869493930009E-01)
-X( 4) = (  8.21084038609466E-01, -3.28552480959103E-01)
-
-X( 5) = (  6.11973750768236E-02,  8.46028600302425E-01)
-
-PATH NUMBER =      1428
-
-ARCLEN =  1.99340680382723E+00
-NFE =  327
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.79556875884693E-01
-
-X( 1) = ( -1.02506674809712E+00,  5.84658243736749E-01)
-X( 2) = ( -8.61393379888375E-01,  2.04244504641106E-01)
-X( 3) = (  6.87248781240599E-01,  1.42552233452949E-01)
-X( 4) = (  6.99453102225821E-01, -1.01040202690002E-01)
-
-X( 5) = (  3.23721887925374E-01,  3.07470541137764E-01)
-
-PATH NUMBER =      1429
-
-ARCLEN =  1.12576589400927E+01
-NFE =  250
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.68802478621993E-13
-
-X( 1) = ( -6.75234666136253E+12, -8.87589327319929E+12)
-X( 2) = (  1.13361154842944E+13, -2.45505408034096E+13)
-X( 3) = ( -8.73479441553225E+12,  1.84883657811283E+13)
-X( 4) = (  5.10479179272750E-01, -1.34326633739552E-02)
-
-X( 5) = ( -1.04566257996125E-13,  1.11357646194465E-13)
-
-PATH NUMBER =      1430
-
-ARCLEN =  3.21052701852756E+00
-NFE =  426
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99850660940500E-01
-
-X( 1) = ( -4.26999919264057E-01, -5.86374550248499E-01)
-X( 2) = (  7.50901307167268E-01, -5.23467932455682E-02)
-X( 3) = (  4.34015091476895E-01,  5.86429359781565E-01)
-X( 4) = ( -1.70794522547448E-01, -2.67115815959100E-01)
-
-X( 5) = (  1.26558172020835E-02,  5.40765083186293E-01)
-
-PATH NUMBER =      1431
-
-ARCLEN =  3.97865044729389E+00
-NFE =  788
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99875655496839E-01
-
-X( 1) = (  2.32414756985066E-01, -6.54702858957217E-01)
-X( 2) = (  2.29577846582887E-01,  2.18063420536770E-01)
-X( 3) = (  7.16634403487129E-01,  6.98113521176770E-03)
-X( 4) = ( -6.05919224131650E-01, -6.59784714491725E-01)
-
-X( 5) = ( -4.64667726787364E-01,  1.09104031866752E+00)
-
-PATH NUMBER =      1432
-
-ARCLEN =  2.77086051326373E+00
-NFE =  173
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.49351609671912E-13
-
-X( 1) = (  5.63822932782425E-01,  7.77469501730219E-02)
-X( 2) = ( -1.05666377502887E+11, -6.81058827751533E+12)
-X( 3) = (  9.98187143430053E+12,  9.03390056746701E+12)
-X( 4) = (  4.35761430037313E+12, -1.00085804616923E+13)
-
-X( 5) = ( -6.47823537435616E-14,  2.96861060039566E-14)
-
-PATH NUMBER =      1433
-
-ARCLEN =  2.13708590806077E+00
-NFE =  266
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92468128001962E-01
-
-X( 1) = (  1.27414997639209E-01, -4.60732198769633E-01)
-X( 2) = (  6.69129387141509E-01, -1.24878815736741E-01)
-X( 3) = (  5.51105799226522E-02,  2.77902416533291E-01)
-X( 4) = (  4.90430618225811E-01, -4.79302959606142E-02)
-
-X( 5) = ( -1.76328964261848E-01,  1.28915220804022E+00)
-
-PATH NUMBER =      1434
-
-ARCLEN =  1.91061816619754E+00
-NFE =  302
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99919620478697E-01
-
-X( 1) = ( -8.19437145428226E-02,  2.02681172301105E-01)
-X( 2) = ( -3.48057705881483E-02, -1.45087787370301E-01)
-X( 3) = (  1.29154150798592E+00,  8.05682475914288E-01)
-X( 4) = (  1.02266123946733E+00, -3.05110204084056E-02)
-
-X( 5) = ( -3.19014118394272E-01,  4.09998812505739E-01)
-
-PATH NUMBER =      1435
-
-ARCLEN =  1.59368853711146E+00
-NFE =  242
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96727653510850E-01
-
-X( 1) = ( -4.74225196004877E-01,  3.93860624375596E-01)
-X( 2) = ( -5.66960887781977E-01,  1.81584776737286E-01)
-X( 3) = (  8.51138551631830E-01,  2.60915020412562E-01)
-X( 4) = (  7.76471953656852E-01, -9.94435069875549E-02)
-
-X( 5) = (  2.70545859807272E-01,  6.53205483471980E-01)
-
-PATH NUMBER =      1436
-
-ARCLEN =  2.36223032354646E+00
-NFE =  365
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99128285185219E-01
-
-X( 1) = ( -4.65612566492423E-01,  5.04956340503413E-01)
-X( 2) = ( -3.18827421091941E-01,  9.60636801100328E-01)
-X( 3) = (  8.27703853603882E-01,  3.53540858696565E-01)
-X( 4) = (  6.68312772100479E-01, -2.11871119384325E-02)
-
-X( 5) = (  1.14314431365648E-01,  3.64519587804601E-01)
-
-PATH NUMBER =      1437
-
-ARCLEN =  2.71967136550922E+00
-NFE =  404
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99175643987628E-01
-
-X( 1) = ( -2.87471956366581E-01,  2.84435560018573E-01)
-X( 2) = ( -1.37753246522648E-01, -3.61842197610403E-01)
-X( 3) = (  7.42434704993403E-01,  2.47440949813696E-01)
-X( 4) = (  7.11008740282313E-01, -1.65782367808441E-01)
-
-X( 5) = ( -2.75805025379198E-01,  9.90457041249057E-01)
-
-PATH NUMBER =      1438
-
-ARCLEN =  6.28961637546459E+00
-NFE =  132
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.55347660222588E-14
-
-X( 1) = ( -1.92980580715496E+13,  7.53097292280383E+12)
-X( 2) = ( -2.40955278767709E+13,  7.47326709375574E+12)
-X( 3) = (  3.05097824945075E+13,  1.20445814912385E+12)
-X( 4) = (  4.95870637828750E-01, -5.26332202424582E-03)
-
-X( 5) = (  5.37854808434213E-14,  8.17657573592978E-14)
-
-PATH NUMBER =      1439
-
-ARCLEN =  1.00474420887260E+01
-NFE =  407
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99584121736942E-01
-
-X( 1) = (  1.13358383725252E+00, -1.69541497613584E+00)
-X( 2) = (  1.12288290691075E+00, -1.60367286248307E-01)
-X( 3) = ( -1.00451261540010E+00,  5.98063155528881E-01)
-X( 4) = (  1.21547424638596E-01, -7.66174948091913E-02)
-
-X( 5) = (  1.41574531104984E+00, -2.06842569870091E+00)
-
-PATH NUMBER =      1440
-
-ARCLEN =  1.23125442619856E+01
-NFE =  333
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.74072950749402E-01
-
-X( 1) = ( -2.58623057956597E-01, -8.73323670525524E-01)
-X( 2) = (  4.78916733323134E-01, -1.19107097364165E+00)
-X( 3) = ( -2.03759778221091E-01,  7.10479511168470E-01)
-X( 4) = (  8.75804555450712E-01, -4.41792334817429E-02)
-
-X( 5) = (  1.78400225237939E+00, -1.07414870230582E+00)
-
-PATH NUMBER =      1441
-
-ARCLEN =  5.49324997427095E+00
-NFE =  378
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99951364682685E-01
-
-X( 1) = (  7.46231126112161E-01, -8.20640360201291E-01)
-X( 2) = (  3.05775221308722E-01, -8.42852236191113E-01)
-X( 3) = (  6.25990459475454E-01,  6.07060076654346E-01)
-X( 4) = (  4.39506570406549E-01, -3.53592208100874E-01)
-
-X( 5) = ( -5.99545717233793E-01, -1.68154305431346E-01)
-
-PATH NUMBER =      1442
-
-ARCLEN =  5.80769818149254E+00
-NFE =  248
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.83497719136167E-01
-
-X( 1) = (  4.70453523739071E-01, -6.65191079898252E-01)
-X( 2) = (  6.80943027992439E-01, -8.94707592528113E-02)
-X( 3) = ( -1.78043361656109E-01,  5.20361468257313E-03)
-X( 4) = (  2.86598989797068E-01,  3.72046768566106E-01)
-
-X( 5) = ( -2.87030437827399E+00, -6.31253522280802E-02)
-
-PATH NUMBER =      1443
-
-ARCLEN =  2.61718597079471E+00
-NFE =  378
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99180831762035E-01
-
-X( 1) = ( -2.80634758286796E-01,  1.57777259212768E-01)
-X( 2) = ( -2.96828126559557E-01, -2.88674193874105E-01)
-X( 3) = (  9.32529089657205E-01,  2.98011887528934E-01)
-X( 4) = (  8.13659087213411E-01, -1.41804960106429E-01)
-
-X( 5) = ( -4.33477479814598E-01,  1.24503619279124E+00)
-
-PATH NUMBER =      1444
-
-ARCLEN =  4.30636510172619E+00
-NFE =  234
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.76566217587570E-10
-
-X( 1) = ( -1.45006176022530E+00,  3.57046846959842E-02)
-X( 2) = (  5.61851160373700E+08,  1.87772921476787E+09)
-X( 3) = ( -1.01011835174370E+09, -2.14615431999542E+09)
-X( 4) = (  6.31815478107011E-01,  7.41139529773552E-04)
-
-X( 5) = (  3.76154516118065E-10, -1.17060744507080E-10)
-
-PATH NUMBER =      1445
-
-ARCLEN =  2.29309732666628E+00
-NFE =  365
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99812469916343E-01
-
-X( 1) = ( -3.61878851792998E-01,  7.15520169043453E-02)
-X( 2) = ( -8.25110447169678E-01, -1.13559086052565E+00)
-X( 3) = (  9.76173816373683E-01,  2.33476539613279E+00)
-X( 4) = (  8.65133017611210E-01, -1.34602922203422E-03)
-
-X( 5) = ( -9.89934029293613E-02,  4.28989975914403E-01)
-
-PATH NUMBER =      1446
-
-ARCLEN =  6.54069848263052E+00
-NFE =  409
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972882682282E-01
-
-X( 1) = (  4.36468305391343E-01,  9.52297748464251E-02)
-X( 2) = ( -1.02409768668425E+00, -4.72012877758569E-01)
-X( 3) = (  2.00398387470163E+00, -1.07362893321366E-01)
-X( 4) = (  6.28329832595179E-01, -1.76522173229207E-01)
-
-X( 5) = ( -3.93495796478970E-01, -1.88035355528161E-01)
-
-PATH NUMBER =      1447
-
-ARCLEN =  2.73369936748643E+01
-NFE =  144
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.00530602977161E-13
-
-X( 1) = ( -8.73097909342849E+13,  1.07871236126450E+13)
-X( 2) = ( -1.73210177804246E+14, -4.99373023880309E+13)
-X( 3) = (  1.45740233661967E+14,  8.03848852971781E+13)
-X( 4) = (  4.81260978841232E-01,  5.82381891635202E-03)
-
-X( 5) = (  3.75694213152616E-14, -2.56228415221327E-14)
-
-PATH NUMBER =      1448
-
-ARCLEN =  7.01087365099192E+02
-NFE = 1184
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99886658256175E-01
-
-X( 1) = (  8.75961839857408E-01, -9.35789206393392E-01)
-X( 2) = (  8.06962283136195E-02, -2.31583563582302E-01)
-X( 3) = (  7.07261345120495E-01,  9.92057409746685E-02)
-X( 4) = ( -9.15489022606503E-01, -5.63506819099486E-01)
-
-X( 5) = ( -7.45862082983681E-01, -1.06067533408265E-01)
-
-PATH NUMBER =      1449
-
-ARCLEN =  2.17951388553936E+01
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991439496146E-01
-
-X( 1) = (  2.35236333037520E+00,  1.05929349610442E-01)
-X( 2) = (  1.06520747836887E+00, -1.38690149154270E-01)
-X( 3) = ( -4.15198586579007E-01,  4.70180561618156E-02)
-X( 4) = (  2.47161010058566E-02, -1.00350325263447E-01)
-
-X( 5) = ( -3.21863372560165E-01,  5.33285464501026E-02)
-
-PATH NUMBER =      1450
-
-ARCLEN =  2.37167572863904E+00
-NFE =  243
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99883650182486E-01
-
-X( 1) = (  8.91670552270042E-01, -3.19760874651438E-01)
-X( 2) = (  3.09002266352887E-01, -1.70605845058182E+00)
-X( 3) = (  5.82770544874613E-01,  7.09583022377496E-01)
-X( 4) = (  1.84466952967484E-01, -2.21104284758837E-01)
-
-X( 5) = ( -3.56117146157720E-01, -5.43724068561807E-02)
-
-PATH NUMBER =      1451
-
-ARCLEN =  1.94910352426767E+00
-NFE =  370
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97891270289322E-01
-
-X( 1) = (  9.17403678446192E-01,  2.90339070967651E-03)
-X( 2) = (  1.42810469627795E-01, -3.45449552314292E-01)
-X( 3) = (  4.50320521006062E-01, -8.90851002303906E-02)
-X( 4) = ( -2.40836918152159E-01, -1.80996283870874E-02)
-
-X( 5) = ( -5.58658978567443E-01,  5.22917870481005E-02)
-
-PATH NUMBER =      1452
-
-ARCLEN =  3.05070370394514E+00
-NFE =  510
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99914262250655E-01
-
-X( 1) = (  1.28831092825463E-01, -1.55098153614176E-01)
-X( 2) = ( -6.39119864377358E-01, -6.80180930161372E-01)
-X( 3) = (  8.92286025669597E-01, -3.67356877683066E-02)
-X( 4) = (  7.49036200428496E-01,  5.66883487046219E-01)
-
-X( 5) = ( -4.31793743816656E-01, -5.44788347384048E-01)
-
-PATH NUMBER =      1453
-
-ARCLEN =  2.23017264880035E+00
-NFE =  418
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99993011386874E-01
-
-X( 1) = (  5.12499761221156E-01,  2.79177136214235E-02)
-X( 2) = (  5.03421930757600E-01, -9.20016578584333E-01)
-X( 3) = (  7.63017150521292E-01,  8.07804002268798E-01)
-X( 4) = ( -3.10486157860346E-01,  1.30178866368542E+00)
-
-X( 5) = ( -2.78141138567139E-01,  9.10774938914212E-02)
-
-PATH NUMBER =      1454
-
-ARCLEN =  2.43314463369955E+00
-NFE =  135
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.90452033215137E-14
-
-X( 1) = ( -1.91753158144304E+13,  2.82710098641894E+13)
-X( 2) = ( -7.83625457742346E+13, -1.24881393657948E+13)
-X( 3) = (  8.95995548148620E+13,  3.39444713282459E+13)
-X( 4) = (  5.38836002787084E-01, -1.52848694434002E-02)
-
-X( 5) = ( -1.66236111247969E-14,  5.07753561418411E-15)
-
-PATH NUMBER =      1455
-
-ARCLEN =  6.89708799738169E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99990437695508E-01
-
-X( 1) = (  5.10968661784258E-01, -2.37866881623120E-01)
-X( 2) = ( -1.07522020314217E+00, -1.96110518208301E+00)
-X( 3) = (  1.79443296342264E+00,  4.42918406477887E-01)
-X( 4) = (  3.87949385163684E-01,  1.72989122207782E-01)
-
-X( 5) = ( -2.27107581265792E-01, -1.51438191893619E-01)
-
-PATH NUMBER =      1456
-
-ARCLEN =  1.39102215958855E+02
-NFE = 1002
-IFLAG2 =  3
-COMPLEX, FINITE SOLUTION
-LAMBDA =  8.89913526427124E-02
-
-X( 1) = ( -1.11107672723861E+00, -1.26275821601650E-01)
-X( 2) = ( -2.43638342391858E+00, -1.81282096225099E+00)
-X( 3) = (  1.73808293229766E+00,  1.61077168277198E+00)
-X( 4) = ( -2.53950039497169E-01,  3.21113224779256E-01)
-
-X( 5) = (  1.64605231672727E+01,  2.19349911211816E+01)
-
-PATH NUMBER =      1457
-
-ARCLEN =  1.40467221555092E+02
-NFE =  448
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.18392651810801E-10
-
-X( 1) = (  4.30420242893452E+10,  1.16886875297390E+10)
-X( 2) = ( -2.02288846309362E+11,  4.35975790488214E+10)
-X( 3) = (  7.13650901382925E-01,  2.82913953913670E-02)
-X( 4) = ( -6.85181672978446E+10, -1.46418679717761E+10)
-
-X( 5) = (  5.27237010560649E-12, -2.94974190472724E-12)
-
-PATH NUMBER =      1458
-
-ARCLEN =  7.45198589858454E+00
-NFE =  127
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.18687658193070E-14
-
-X( 1) = (  1.19748306247407E+13,  7.90371305497657E+11)
-X( 2) = (  1.75426515010081E+13, -2.23271753997171E+12)
-X( 3) = ( -1.07219413809478E+13,  4.51443436600770E+11)
-X( 4) = (  4.98626882929557E-01,  3.63959670243690E-03)
-
-X( 5) = ( -4.78497178945519E-14,  1.76898968563821E-14)
-
-PATH NUMBER =      1459
-
-ARCLEN =  2.41254974016420E+00
-NFE =  202
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.84475765961247E-01
-
-X( 1) = (  9.78393607822186E-01, -4.16040043342077E-02)
-X( 2) = (  1.86984788724500E+00, -2.22830391656174E-01)
-X( 3) = ( -1.04180572797417E+00, -1.92601496895533E-01)
-X( 4) = ( -2.54001155726955E-02, -1.29664478547138E-02)
-
-X( 5) = ( -3.76422281559097E-01,  4.17665797566898E-01)
-
-PATH NUMBER =      1460
-
-ARCLEN =  1.58413592216695E+00
-NFE =  322
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99560785987661E-01
-
-X( 1) = (  8.83687860782060E-01,  6.60616031070517E-03)
-X( 2) = (  1.44237213360156E+00, -1.44590120783962E+00)
-X( 3) = ( -3.18256434047960E-01,  6.12170640118007E-01)
-X( 4) = ( -9.88001430607826E-02,  5.30988572022919E-02)
-
-X( 5) = ( -3.16625335047980E-01,  1.25846777749153E-01)
-
-PATH NUMBER =      1461
-
-ARCLEN =  1.60192688564243E+00
-NFE =  290
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97185663308407E-01
-
-X( 1) = (  7.19329620834922E-01, -2.18174714959576E-02)
-X( 2) = (  7.73346043555322E-01, -1.53440257181206E-01)
-X( 3) = ( -1.70882084978460E-01,  6.59232729963041E-02)
-X( 4) = ( -1.36115897413597E-01,  3.41694333219184E-01)
-
-X( 5) = ( -4.89982894432768E-01,  3.85236528923423E-01)
-
-PATH NUMBER =      1462
-
-ARCLEN =  1.73995276276265E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997743734403E-01
-
-X( 1) = (  8.07699258986775E-01,  5.60167478630943E-01)
-X( 2) = (  7.47390289374990E-01, -1.02735793435789E+00)
-X( 3) = (  2.86201720878283E-01,  1.85205974933587E-01)
-X( 4) = (  3.81892413158382E-01,  1.22642567618481E+00)
-
-X( 5) = ( -2.97146418573980E-01,  4.35849831836889E-02)
-
-PATH NUMBER =      1463
-
-ARCLEN =  2.24713868394580E+00
-NFE =  244
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.89692443026343E-13
-
-X( 1) = (  1.49479285672343E+12,  3.49907285972493E+12)
-X( 2) = ( -8.25305860444861E+12,  8.06135289972431E+11)
-X( 3) = (  7.41652150295810E+12, -3.18347389857394E+12)
-X( 4) = (  4.92483258270915E-01,  1.76590779679968E-03)
-
-X( 5) = ( -7.32553395114272E-14, -8.64620332795274E-14)
-
-PATH NUMBER =      1464
-
-ARCLEN =  5.03882659437374E+00
-NFE =  295
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999824E-01
-
-X( 1) = (  6.35976870186161E-02,  1.51967362201839E-02)
-X( 2) = ( -5.22986143747020E+02, -9.51549543669798E+02)
-X( 3) = (  5.15138667707182E+02,  2.91024915620106E+02)
-X( 4) = (  9.08932698773723E-01,  1.79370607266828E-03)
-
-X( 5) = ( -5.61431956226885E-04, -5.16710259515197E-04)
-
-PATH NUMBER =      1465
-
-ARCLEN =  3.92242910204473E+01
-NFE =  304
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.86373805597527E-09
-
-X( 1) = ( -1.59588873415009E+08, -2.30339691543015E+07)
-X( 2) = (  4.83589823910419E-01, -2.63866685593523E-01)
-X( 3) = (  3.07962898346266E+07,  5.24001784767494E+07)
-X( 4) = (  1.66516248784245E+08,  7.74904148784568E+07)
-
-X( 5) = (  5.76284159563463E-09,  6.58335340235350E-10)
-
-PATH NUMBER =      1466
-
-ARCLEN =  3.07974464842332E+01
-NFE =  173
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.18469540871658E-14
-
-X( 1) = ( -3.57474802294915E+13,  5.06846401383257E+12)
-X( 2) = ( -7.14425085233857E+13, -1.92175737621663E+13)
-X( 3) = (  6.03943645703880E+13,  3.19134820337898E+13)
-X( 4) = (  4.99581903641687E-01, -5.18250350987675E-03)
-
-X( 5) = (  9.26458345804071E-14, -6.07824337736651E-14)
-
-PATH NUMBER =      1467
-
-ARCLEN =  5.49071345254674E+00
-NFE =  337
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99888854675324E-01
-
-X( 1) = (  4.97681337196465E-01,  2.58851328168983E-01)
-X( 2) = (  1.35945866413518E+00, -1.77509280236492E+00)
-X( 3) = ( -7.89567067799298E-02,  1.69776762832770E+00)
-X( 4) = (  4.41654702921783E-01, -2.98113954366452E-01)
-
-X( 5) = ( -1.97280668973923E-01,  1.90760119689351E-01)
-
-PATH NUMBER =      1468
-
-ARCLEN =  2.55697411743278E+00
-NFE =  259
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999993E-01
-
-X( 1) = (  8.66902253864661E-01, -4.34019602301967E-03)
-X( 2) = (  1.03545021025763E+02, -2.06854350052336E+02)
-X( 3) = ( -1.14147090190871E+00,  1.01048164893364E+00)
-X( 4) = ( -1.91964218474574E-01, -1.99397069235180E-01)
-
-X( 5) = ( -3.39602343544335E-03, -1.47326567956132E-03)
-
-PATH NUMBER =      1469
-
-ARCLEN =  2.14302629624053E+00
-NFE =  347
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99997261585070E-01
-
-X( 1) = (  8.23755120164876E-01, -1.95106908218336E-01)
-X( 2) = (  2.34142867623965E+00, -2.83635747833493E+00)
-X( 3) = (  4.79100577540991E-01,  2.73072935956420E-02)
-X( 4) = ( -2.34350869179095E-01, -2.76892522510235E-01)
-
-X( 5) = ( -1.87195340952122E-01, -1.45564344724818E-02)
-
-PATH NUMBER =      1470
-
-ARCLEN =  1.27994170060900E+00
-NFE =  278
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96958420964733E-01
-
-X( 1) = (  6.48181722272938E-01,  2.63244511844760E-01)
-X( 2) = (  8.78299001163380E-01, -1.89002763518803E-01)
-X( 3) = (  5.12885145538104E-02,  5.52442832283708E-02)
-X( 4) = ( -3.59828514435006E-01,  6.51439362708823E-02)
-
-X( 5) = ( -3.12060193619203E-01,  2.99563703165920E-01)
-
-PATH NUMBER =      1471
-
-ARCLEN =  1.69284442802455E+00
-NFE =  194
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.69647036686416E-07
-
-X( 1) = (  3.69642350996321E+06,  4.42779802705372E+06)
-X( 2) = (  1.66978940990669E+00, -2.37394167311611E-01)
-X( 3) = (  9.92374160298400E+06,  2.67422607002471E+06)
-X( 4) = ( -5.77371424474061E-02, -3.06538832673273E-03)
-
-X( 5) = ( -4.36256192936474E-08,  1.36464022101749E-08)
-
-PATH NUMBER =      1472
-
-ARCLEN =  1.37166917584652E+00
-NFE =  301
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99690588785344E-01
-
-X( 1) = (  6.98188429594927E-01,  3.47551411766934E-01)
-X( 2) = (  1.33510759951174E-01, -2.86000244460716E-01)
-X( 3) = (  8.94181644352126E-01, -2.88498769835520E-02)
-X( 4) = ( -4.14959572272622E-01,  3.36003742306113E-01)
-
-X( 5) = ( -3.62937190826596E-01,  1.19656697120853E-01)
-
-PATH NUMBER =      1473
-
-ARCLEN =  2.97533373208775E+00
-NFE =  213
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.88333303433743E-13
-
-X( 1) = ( -9.91166781969777E+11, -2.42930356438920E+12)
-X( 2) = (  5.69921178027529E+12, -4.62797969205415E+11)
-X( 3) = ( -5.14924397269326E+12,  2.11129674307682E+12)
-X( 4) = (  4.99669197877111E-01, -5.20778795572718E-05)
-
-X( 5) = (  1.08271464710485E-13,  1.23636452638298E-13)
-
-PATH NUMBER =      1474
-
-ARCLEN =  3.49935045512877E+00
-NFE =  314
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98019095518527E-01
-
-X( 1) = (  5.54952821440870E-01, -1.34706913421289E-01)
-X( 2) = (  5.00234170269709E-01,  5.99555171383822E-02)
-X( 3) = ( -7.90317741332802E-02, -3.51060478152421E-02)
-X( 4) = ( -8.33329922935511E-01,  6.55758944074433E-01)
-
-X( 5) = ( -4.66016036616072E-01,  4.71942543793820E-01)
-
-PATH NUMBER =      1475
-
-ARCLEN =  1.05461659994367E+01
-NFE =  558
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99833657880742E-01
-
-X( 1) = (  3.94614205741435E-01,  6.45633086595837E-01)
-X( 2) = (  4.59470775868124E-01, -2.29009493224466E-01)
-X( 3) = ( -8.80185828094929E-01, -2.43998045349242E-02)
-X( 4) = (  6.32092778039944E-01,  1.35153068324996E-01)
-
-X( 5) = (  1.74055949037501E-01,  7.43142391821133E-01)
-
-PATH NUMBER =      1476
-
-ARCLEN =  2.70787856021567E+00
-NFE =  323
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98999282376808E-01
-
-X( 1) = (  5.54129037561991E-01,  1.65375157057771E-01)
-X( 2) = (  2.01888139979119E+00, -5.35215596102809E-01)
-X( 3) = ( -9.33682931589066E-01,  6.38866455889824E-01)
-X( 4) = (  3.48634562858835E-01, -1.80802344325092E-01)
-
-X( 5) = ( -1.40421321537089E-01,  3.19445557516437E-01)
-
-PATH NUMBER =      1477
-
-ARCLEN =  2.80231453640396E+00
-NFE =  323
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999950E-01
-
-X( 1) = (  1.05236180081415E+00,  1.97939138752383E-01)
-X( 2) = (  4.65975115389706E+02, -1.18517734864347E+02)
-X( 3) = (  9.67628705970279E-02,  1.94511621565348E-01)
-X( 4) = ( -2.61389302491553E+02,  4.16888672426619E+02)
-
-X( 5) = ( -1.11672374958657E-03,  3.75258889926856E-04)
-
-PATH NUMBER =      1478
-
-ARCLEN =  1.29477150493778E+00
-NFE =  278
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97633585088679E-01
-
-X( 1) = (  2.94268730402880E-01,  6.83926148611078E-01)
-X( 2) = (  9.85773075927222E-01, -8.03298747211774E-02)
-X( 3) = (  2.95937092531955E-03, -6.63503062117781E-02)
-X( 4) = (  1.05765126138704E-01, -3.69149625934476E-01)
-
-X( 5) = ( -1.74360472383336E-01,  3.70404804782292E-01)
-
-PATH NUMBER =      1479
-
-ARCLEN =  1.21713821563004E+00
-NFE =  342
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99804586154706E-01
-
-X( 1) = (  6.03963049736732E-01,  5.10251025402178E-01)
-X( 2) = (  9.72496001264093E-01, -3.86874762809497E-01)
-X( 3) = (  3.03411255270964E-01,  4.76921244261907E-01)
-X( 4) = ( -3.58417687977663E-02, -2.92565942247558E-01)
-
-X( 5) = ( -2.15024554760200E-01,  2.39302009478583E-01)
-
-PATH NUMBER =      1480
-
-ARCLEN =  1.46333906458342E+00
-NFE =  408
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99962845816386E-01
-
-X( 1) = ( -5.63984850556608E-02,  1.20993048446021E+00)
-X( 2) = (  6.69013580462275E-01, -5.83328273085962E-02)
-X( 3) = (  7.66686912347033E-01, -2.23594484716878E-01)
-X( 4) = ( -1.08651737798395E-01, -1.41325681918771E-01)
-
-X( 5) = ( -1.76743995827971E-01,  2.58370383602024E-01)
-
-PATH NUMBER =      1481
-
-ARCLEN =  2.04060440843805E+00
-NFE =  304
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999786682426E-01
-
-X( 1) = ( -9.00922992562817E-01,  2.30693072239754E+00)
-X( 2) = (  7.55849254717413E-01, -2.18716661372451E-01)
-X( 3) = (  5.78393895206205E-02, -1.51215098293631E-01)
-X( 4) = (  5.43993099969957E-01,  6.00681770532817E-01)
-
-X( 5) = ( -4.82102885342416E-02,  2.40160271642026E-01)
-
-PATH NUMBER =      1482
-
-ARCLEN =  2.07500180947292E+00
-NFE =  218
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.81307993206358E-12
-
-X( 1) = (  3.20508460092027E+12, -1.56762236621699E+12)
-X( 2) = ( -1.25465844398276E+12,  6.95821382479222E+12)
-X( 3) = ( -2.64266083028761E+12, -5.62611585173764E+12)
-X( 4) = (  5.50983166041990E-01, -7.10379796345165E-02)
-
-X( 5) = (  8.27864252844757E-14, -6.84024234823277E-14)
-
-PATH NUMBER =      1483
-
-ARCLEN =  2.70022885506480E+00
-NFE =  222
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.68634816821413E-14
-
-X( 1) = (  4.42856532824464E-01, -2.13635191498864E-01)
-X( 2) = (  4.30070135353333E+13,  1.52716054200063E+14)
-X( 3) = ( -8.86287102651916E+13, -1.02715235627519E+14)
-X( 4) = (  1.57491474321946E+14, -2.44073887218996E+13)
-
-X( 5) = (  3.75985050385386E-15, -6.10947924195582E-16)
-
-PATH NUMBER =      1484
-
-ARCLEN =  9.63985211651730E+00
-NFE =  446
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96301775507613E-01
-
-X( 1) = (  2.48316656021426E-01,  2.61485093821976E-01)
-X( 2) = (  7.10795544002659E-01, -1.99004985490080E-01)
-X( 3) = ( -7.23090232336522E-01, -7.79782757147761E-01)
-X( 4) = (  3.06073714465857E-01, -5.55490990834041E-03)
-
-X( 5) = (  1.91453190564304E+00,  1.56612395595835E+00)
-
-PATH NUMBER =      1485
-
-ARCLEN =  2.76084754982644E+00
-NFE =  460
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99962581034895E-01
-
-X( 1) = (  8.25702289721873E-01,  1.61260614177251E-01)
-X( 2) = (  1.01227879812285E+00, -1.42965575573553E+00)
-X( 3) = (  4.72262838205482E-01, -1.81240720461193E-01)
-X( 4) = ( -7.15406970279836E-02,  1.21066554667071E-01)
-
-X( 5) = ( -2.93472369135535E-01, -1.45574604594884E-02)
-
-PATH NUMBER =      1486
-
-ARCLEN =  1.82698900297208E+00
-NFE =  129
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.31714185818135E-15
-
-X( 1) = (  4.86984406838069E-01,  6.53372400336046E-03)
-X( 2) = ( -1.41401216547142E+14,  1.09309650623003E+14)
-X( 3) = ( -7.93011266986726E+12, -8.72771868467858E+13)
-X( 4) = ( -4.67042639966888E+12,  1.12642578380650E+14)
-
-X( 5) = (  3.23994845709275E-15, -3.02302670743271E-15)
-
-PATH NUMBER =      1487
-
-ARCLEN =  1.52784506835174E+00
-NFE =  128
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.90360912695322E-15
-
-X( 1) = (  4.61770859754655E-01, -4.32195963030740E-03)
-X( 2) = (  5.53078247908536E+13,  8.26693470710658E+13)
-X( 3) = ( -3.64282558553221E+13, -2.30474194826989E+12)
-X( 4) = (  3.87042038910260E+13,  1.11240400828447E+13)
-
-X( 5) = (  5.17386697720945E-15,  7.14754861200206E-15)
-
-PATH NUMBER =      1488
-
-ARCLEN =  1.31716652127253E+00
-NFE =  350
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99899113819922E-01
-
-X( 1) = (  1.81467899495662E-01,  6.11814316240487E-01)
-X( 2) = (  1.07358796317170E+00,  4.03317153564786E-02)
-X( 3) = (  2.17153104057126E-01,  6.29235054661933E-01)
-X( 4) = (  7.21722874458447E-02, -3.61216438627107E-02)
-
-X( 5) = ( -1.11824779796865E-01,  2.62513272203352E-01)
-
-PATH NUMBER =      1489
-
-ARCLEN =  1.70846278040197E+00
-NFE =  210
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.77897706583678E-08
-
-X( 1) = ( -1.86682868917262E+06, -4.15401370209420E+06)
-X( 2) = (  1.17095041121454E+00,  2.30926205342271E-02)
-X( 3) = ( -4.02121516852290E+06, -3.03549579622215E+06)
-X( 4) = (  6.56301916742117E-02,  1.35049027191931E-02)
-
-X( 5) = (  5.99897206968441E-08, -4.68007576819160E-08)
-
-PATH NUMBER =      1490
-
-ARCLEN =  2.27322381282980E+00
-NFE =  222
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999996029E-01
-
-X( 1) = ( -3.49353326575643E+01,  5.08793948291834E+01)
-X( 2) = (  6.05946327385678E-02, -1.27738555108890E-01)
-X( 3) = (  5.37567435235033E+01, -1.23984953180521E+01)
-X( 4) = (  1.02568631840728E+00,  6.35800203161776E-03)
-
-X( 5) = ( -7.86912374411207E-03,  8.78394157203583E-03)
-
-PATH NUMBER =      1491
-
-ARCLEN =  1.75144361472524E+00
-NFE =  291
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999774276490E-01
-
-X( 1) = ( -2.54647827829511E+00, -3.81475762195210E+00)
-X( 2) = (  1.15132907956459E+00,  2.30528003061826E-02)
-X( 3) = ( -5.72119105008105E+00,  4.24115154774139E+00)
-X( 4) = (  5.13468088417747E-02,  6.37878963416476E-03)
-
-X( 5) = (  7.14995258746191E-02,  2.64468486591280E-02)
-
-PATH NUMBER =      1492
-
-ARCLEN =  4.12634162094525E+00
-NFE =  381
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999613E-01
-
-X( 1) = (  1.01193265142836E+00, -2.16558018283250E-02)
-X( 2) = (  7.91780623680418E-02,  8.19541878143044E-02)
-X( 3) = (  3.05545995208796E+00, -1.85619793788234E+01)
-X( 4) = ( -5.77519477673684E+01,  3.61071752691786E+01)
-
-X( 5) = ( -2.56034794312479E-02, -2.68187118905239E-03)
-
-PATH NUMBER =      1493
-
-ARCLEN =  5.80037058805294E+00
-NFE =  272
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.97663438012470E-07
-
-X( 1) = (  6.66684938999819E-01, -3.07993009079491E-02)
-X( 2) = ( -2.75908535838920E+00, -1.01968920964412E-01)
-X( 3) = ( -3.44541121075019E+05, -6.59084361324150E+05)
-X( 4) = ( -2.72345746894901E+05, -2.72700189594722E+05)
-
-X( 5) = (  7.50546349602486E-07, -8.44833587911541E-07)
-
-PATH NUMBER =      1494
-
-ARCLEN =  1.76937806619263E+00
-NFE =  302
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98498832888747E-01
-
-X( 1) = ( -7.50584460947070E-02,  5.33300273935884E-01)
-X( 2) = (  8.93361519799986E-01, -4.87680507327409E-01)
-X( 3) = (  6.99927922732407E-01,  3.07566012492556E-01)
-X( 4) = (  4.04632895207205E-02, -5.26256830931246E-01)
-
-X( 5) = ( -2.01277518014028E-01,  2.88453636946885E-01)
-
-PATH NUMBER =      1495
-
-ARCLEN =  1.45847269206058E+00
-NFE =  292
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98407133765993E-01
-
-X( 1) = (  1.25573698396892E-01, -4.89370846837093E-02)
-X( 2) = (  1.22680827349063E+00, -1.40295898863203E-01)
-X( 3) = (  7.15724045958697E-02,  6.79130010200268E-01)
-X( 4) = (  6.18906142411282E-01, -1.09169930347842E+00)
-
-X( 5) = ( -4.99234031594285E-02,  4.02761618394373E-01)
-
-PATH NUMBER =      1496
-
-ARCLEN =  1.12018423039942E+00
-NFE =  231
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93932540095150E-01
-
-X( 1) = ( -1.75046491700086E-01,  7.80972472990254E-03)
-X( 2) = (  1.08294248554112E+00, -5.60150548300010E-02)
-X( 3) = (  5.73314061154746E-02,  5.60642366461411E-01)
-X( 4) = (  7.54147330357807E-01, -5.06369561989752E-01)
-
-X( 5) = ( -2.39115877509099E-03,  4.42301015919296E-01)
-
-PATH NUMBER =      1497
-
-ARCLEN =  1.53050494844696E+00
-NFE =  356
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98823696841053E-01
-
-X( 1) = (  4.44360730348220E-01,  2.50449195828614E-01)
-X( 2) = (  9.03470489836338E-01, -1.31451926772896E-01)
-X( 3) = (  1.17428925432145E-01,  3.45795498596320E-01)
-X( 4) = (  1.24096423632474E-01, -8.46601008963038E-02)
-
-X( 5) = ( -2.36447309684088E-01,  3.58249328050756E-01)
-
-PATH NUMBER =      1498
-
-ARCLEN =  1.27863540436235E+00
-NFE =  100
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.12041626004155E-13
-
-X( 1) = ( -9.20108302214739E+10, -5.63948819971793E+11)
-X( 2) = (  4.95376009319558E-01, -2.90675922027594E-01)
-X( 3) = ( -8.50510955281918E+11,  5.87309910879934E+10)
-X( 4) = (  1.62404192333269E+11,  4.55182529703058E+11)
-
-X( 5) = (  5.63300274480927E-13, -2.96218453411934E-13)
-
-PATH NUMBER =      1499
-
-ARCLEN =  1.17997662056554E+00
-NFE =  126
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.31920595666066E-12
-
-X( 1) = ( -1.14653497638244E+11,  2.47787808125292E+11)
-X( 2) = (  4.99718892192418E-01, -2.76567388548805E-01)
-X( 3) = (  3.88765658080039E+11,  1.34692760612676E+11)
-X( 4) = ( -2.43742759342849E+10, -1.68998591714394E+11)
-
-X( 5) = ( -8.12786090601675E-13,  1.06833639157422E-12)
-
-PATH NUMBER =      1500
-
-ARCLEN =  2.33212454060382E+00
-NFE =  408
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999946797E-01
-
-X( 1) = ( -2.67413869892166E+01,  2.69319838862990E+00)
-X( 2) = ( -3.31261308131678E-01, -2.16538715338528E-02)
-X( 3) = (  1.33169296956523E+01,  6.75513971606724E+00)
-X( 4) = (  8.84594460984824E-01, -1.92175269144602E-03)
-
-X( 5) = (  1.55927919516996E-02,  2.89614104524585E-02)
-
-PATH NUMBER =      1501
-
-ARCLEN =  1.98998698013996E+00
-NFE =  437
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99965165787884E-01
-
-X( 1) = ( -2.99000962705118E-01,  1.63116456543867E-01)
-X( 2) = (  7.40549142891637E-01, -4.66307806485042E-02)
-X( 3) = (  7.65744858476545E-01,  5.37000621205648E-01)
-X( 4) = ( -8.98726434995031E-01, -2.95904048056941E-01)
-
-X( 5) = ( -1.09961990937513E-01,  2.88747675173167E-01)
-
-PATH NUMBER =      1502
-
-ARCLEN =  2.13235453996813E+00
-NFE =  336
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99310387497035E-01
-
-X( 1) = ( -5.36682466110884E-02,  3.58392443792221E-02)
-X( 2) = (  6.31454795200710E-01, -1.94093516695539E-01)
-X( 3) = ( -1.07228216126459E-02,  1.22378461414123E+00)
-X( 4) = (  1.00417604430137E+00, -1.08894611070583E-01)
-
-X( 5) = (  4.90491294808984E-03,  4.10129569894762E-01)
-
-PATH NUMBER =      1503
-
-ARCLEN =  7.56801415315020E+00
-NFE =  378
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999995467E-01
-
-X( 1) = (  3.61260524231965E+00, -4.30518210947165E+00)
-X( 2) = (  1.42866610264905E+00,  1.17054567588282E-01)
-X( 3) = (  1.28380062328972E-01,  1.34356296089888E-02)
-X( 4) = (  2.84531901519927E+01, -4.13725209116092E+00)
-
-X( 5) = (  1.59813469829667E-02, -4.59051298341566E-02)
-
-PATH NUMBER =      1504
-
-ARCLEN =  1.78393807203021E+00
-NFE =  368
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99864169757656E-01
-
-X( 1) = (  1.72728729732844E-01, -4.35748685490788E-01)
-X( 2) = (  7.80087992871241E-01, -4.73380875709702E-01)
-X( 3) = (  5.07676599056420E-01,  6.67646498257214E-01)
-X( 4) = (  2.33246645884787E-01, -1.17630965963902E+00)
-
-X( 5) = ( -2.48126721025336E-01,  5.66619939899583E-01)
-
-PATH NUMBER =      1505
-
-ARCLEN =  1.24980945148758E+00
-NFE =  272
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99012312239055E-01
-
-X( 1) = ( -2.18619267742224E-02, -1.07673660077253E-01)
-X( 2) = (  1.02660872077753E+00, -2.47772324515872E-01)
-X( 3) = (  3.52290058789651E-01,  7.47802989846995E-01)
-X( 4) = (  7.26149433292103E-01, -7.40583782342730E-01)
-
-X( 5) = ( -1.10449355997300E-01,  4.41902947199288E-01)
-
-PATH NUMBER =      1506
-
-ARCLEN =  1.39966353079144E+00
-NFE =  238
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98521726061799E-01
-
-X( 1) = ( -4.54074013157888E-01, -8.87749028130673E-02)
-X( 2) = (  6.67079913778557E-01, -2.98103624092011E-01)
-X( 3) = (  4.26451637494487E-01,  4.87494118017254E-01)
-X( 4) = (  7.12017138647099E-01, -2.54296428630860E-01)
-
-X( 5) = ( -2.35064159678056E-02,  6.26551561950146E-01)
-
-PATH NUMBER =      1507
-
-ARCLEN =  2.94832076450651E+00
-NFE =  231
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.67668750519271E-09
-
-X( 1) = (  3.44931012056793E+06, -4.27491673572450E+08)
-X( 2) = (  5.03091447872680E-01, -2.75625743528806E-01)
-X( 3) = ( -1.76923172655268E+08, -6.90287195761748E+07)
-X( 4) = ( -1.18095493295707E+08,  4.93732163169328E+08)
-
-X( 5) = (  3.59052659782907E-10, -1.34879113813154E-09)
-
-PATH NUMBER =      1508
-
-ARCLEN =  1.29622825237455E+00
-NFE =  132
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.45438482616073E-12
-
-X( 1) = ( -3.37397600725130E+10, -1.67500801975428E+10)
-X( 2) = (  4.99388771413132E-01, -2.87510688934164E-01)
-X( 3) = ( -1.15003707425682E+10,  5.96290915377848E+10)
-X( 4) = (  2.34718555247542E+10,  6.10487998904436E+09)
-
-X( 5) = (  7.58376689355064E-12,  7.50276837185870E-12)
-
-PATH NUMBER =      1509
-
-ARCLEN =  1.50605348381180E+00
-NFE =  304
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.69682316181389E-06
-
-X( 1) = ( -1.17898121270941E+06, -1.01031508301238E+05)
-X( 2) = ( -1.51618596703265E-01,  2.31649110071125E-02)
-X( 3) = (  8.38457776793557E+05,  1.30383927583712E+06)
-X( 4) = (  9.55420146067440E-01,  1.38866307201540E-04)
-
-X( 5) = (  5.86852187279413E-08,  4.34797088703475E-07)
-
-PATH NUMBER =      1510
-
-ARCLEN =  2.49488450098767E+00
-NFE =  313
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.91498196437691E-01
-
-X( 1) = ( -3.65677109884591E-01, -5.18914669227828E-01)
-X( 2) = (  4.53460574008238E-01, -4.00841003942531E-01)
-X( 3) = ( -1.45819561387338E-02,  4.66949814276199E-01)
-X( 4) = (  7.80992117863644E-01,  1.19859406001261E-01)
-
-X( 5) = (  8.14487548909848E-01,  8.21959652798153E-01)
-
-PATH NUMBER =      1511
-
-ARCLEN =  1.87483483405031E+00
-NFE =  291
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98777707609109E-01
-
-X( 1) = ( -3.58778890445026E-01,  2.29917647170015E-01)
-X( 2) = (  4.44950670366828E-01, -2.27342328607013E-01)
-X( 3) = (  8.38299934699225E-01,  3.35427672958969E-01)
-X( 4) = (  5.85045937420914E-01, -2.81830807724278E-01)
-
-X( 5) = ( -2.06372703277888E-01,  5.12400207764183E-01)
-
-PATH NUMBER =      1512
-
-ARCLEN =  4.09132530196865E+01
-NFE =  471
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.16460241139638E-12
-
-X( 1) = ( -3.46357229686701E+09,  2.61829720750512E+12)
-X( 2) = ( -5.37380481121801E+12,  3.26267062741262E+12)
-X( 3) = (  2.28342278653058E+12, -3.56285589771168E+11)
-X( 4) = (  4.97898502137881E-01, -5.29708818169343E-03)
-
-X( 5) = (  2.73102205997425E-13,  1.56893595337770E-13)
-
-PATH NUMBER =      1513
-
-ARCLEN =  5.84032762967277E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99960033505527E-01
-
-X( 1) = (  7.60605649302715E-01, -1.04456428581620E+00)
-X( 2) = (  5.31217192571912E-01, -4.67403893830061E-01)
-X( 3) = (  4.45851434632714E-01,  7.75554521810948E-01)
-X( 4) = (  2.60426344628052E-01, -8.97357798807609E-01)
-
-X( 5) = ( -1.03426506302158E+00,  3.15642133198195E-01)
-
-PATH NUMBER =      1514
-
-ARCLEN =  2.85292465981492E+00
-NFE =  309
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97894089351434E-01
-
-X( 1) = ( -1.08569545544134E-01, -4.35967275389940E-01)
-X( 2) = (  4.96686142336763E-01, -7.68524346545282E-01)
-X( 3) = (  3.10097028665321E-01,  7.08833159014110E-01)
-X( 4) = (  9.20916255871215E-01, -2.12954061114204E-01)
-
-X( 5) = ( -6.93172906951439E-01,  1.29546920937104E+00)
-
-PATH NUMBER =      1515
-
-ARCLEN =  1.20005298027552E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99276676158173E-01
-
-X( 1) = ( -1.53542081763067E-01, -7.38115937188307E-02)
-X( 2) = (  6.55530010541582E-01,  2.23559326081221E-02)
-X( 3) = (  1.61697207415094E-01,  8.93653041988106E-01)
-X( 4) = (  8.60908546163426E-01, -2.19612890120578E-01)
-
-X( 5) = (  3.29597845200645E-02,  4.49662326794464E-01)
-
-PATH NUMBER =      1516
-
-ARCLEN =  2.14624147980302E+00
-NFE =  212
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.85387149971566E-06
-
-X( 1) = (  7.22127647698873E-01,  7.98408374715936E-01)
-X( 2) = ( -5.41445520109213E-02, -3.15218325241484E-01)
-X( 3) = (  1.03135996984658E+05, -1.42831732485900E+04)
-X( 4) = (  8.41405695019658E-01, -8.33171448237435E-02)
-
-X( 5) = ( -6.88187562630964E-06, -1.29085782022678E-06)
-
-PATH NUMBER =      1517
-
-ARCLEN =  3.20367628433953E+00
-NFE =  236
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.59775723832911E-08
-
-X( 1) = (  1.07027116336852E+07, -1.01837827806210E+07)
-X( 2) = ( -1.12997961665851E-01, -1.51457250293936E-01)
-X( 3) = ( -2.48572789865845E+07, -1.71577496650494E+07)
-X( 4) = (  1.05173016260183E+00, -2.63701951333246E-02)
-
-X( 5) = (  1.14051361672733E-08, -1.69292239155135E-08)
-
-PATH NUMBER =      1518
-
-ARCLEN =  3.50325067298566E+00
-NFE =  251
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999981E-01
-
-X( 1) = ( -9.15559923122799E+01, -1.95289520785539E+02)
-X( 2) = ( -2.33640843308592E+00,  5.17665308308019E-03)
-X( 3) = (  1.17266628346989E+02,  2.51353928351510E+02)
-X( 4) = (  6.30582232333797E-01,  7.29446779840640E-05)
-
-X( 5) = (  2.21352992344996E-03,  6.33533861820093E-03)
-
-PATH NUMBER =      1519
-
-ARCLEN =  2.28254610074783E+00
-NFE =  236
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.85412328966149E-08
-
-X( 1) = ( -1.10734277012349E-01,  3.41526668337263E-01)
-X( 2) = (  7.17070354150892E-01, -7.46510260445278E-02)
-X( 3) = (  1.03328119066213E+08,  1.35914042657708E+08)
-X( 4) = (  2.19143614504036E+07, -1.33960831396406E+08)
-
-X( 5) = ( -1.55825039772016E-09,  4.34927060029766E-09)
-
-PATH NUMBER =      1520
-
-ARCLEN =  1.35111078396289E+01
-NFE =  249
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.43373615227541E-12
-
-X( 1) = ( -1.11763552975151E+12,  1.75393238828276E+11)
-X( 2) = ( -1.03809525465904E+12, -1.94682693820459E+12)
-X( 3) = (  3.96975292687334E+11,  9.40099355387251E+11)
-X( 4) = (  5.00834677977272E-01, -2.06164983003020E-03)
-
-X( 5) = (  8.17114306989400E-13, -1.94896263841157E-12)
-
-PATH NUMBER =      1521
-
-ARCLEN =  1.46547894135435E+01
-NFE =  310
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.67613139618835E-06
-
-X( 1) = ( -7.63510011833854E+05,  1.03592399251659E+06)
-X( 2) = (  4.69635557626669E-02, -4.88026468848252E-02)
-X( 3) = (  5.43458483563580E-01,  1.78391866150868E-03)
-X( 4) = (  3.51733093547906E+05,  1.24576620643237E+05)
-
-X( 5) = (  1.69625778576586E-07,  6.17671588607166E-07)
-
-PATH NUMBER =      1522
-
-ARCLEN =  1.95345574233631E+01
-NFE =  289
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.41121916635132E-10
-
-X( 1) = ( -1.27152406836765E+00, -1.41642102442665E-01)
-X( 2) = (  7.54936975641225E+08,  9.59155555043546E+08)
-X( 3) = ( -8.68020661373969E+08, -4.56123673614900E+08)
-X( 4) = (  6.31260845830660E-01,  2.53277093329748E-03)
-
-X( 5) = (  5.39945073949142E-10,  3.72378844014538E-10)
-
-PATH NUMBER =      1523
-
-ARCLEN =  2.48111755165360E+00
-NFE =  270
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.62050007539059E-01
-
-X( 1) = (  2.72458619954879E-02, -5.43009049420404E-01)
-X( 2) = (  6.13127601563205E-01, -7.56285179389516E-01)
-X( 3) = ( -2.57962508733600E-01,  7.27693881341294E-01)
-X( 4) = (  7.25689293994563E-01,  7.53441561140283E-02)
-
-X( 5) = (  1.24352128040772E-01,  1.72032888358113E+00)
-
-PATH NUMBER =      1524
-
-ARCLEN =  1.67360560902759E+00
-NFE =  405
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98333552850954E-01
-
-X( 1) = ( -2.30800805652807E-02, -3.71857643421476E-02)
-X( 2) = (  7.50448011929576E-01, -1.73716330924596E-01)
-X( 3) = (  5.74217766701505E-03,  8.40619196211068E-01)
-X( 4) = (  7.47564378187933E-01, -1.44549862437502E-02)
-
-X( 5) = ( -4.32103010317839E-02,  4.90668754433312E-01)
-
-PATH NUMBER =      1525
-
-ARCLEN =  1.88418179207640E+00
-NFE =  218
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.18878732587279E-06
-
-X( 1) = (  5.93854268845675E-01,  9.12093983457800E-01)
-X( 2) = (  8.56450310265732E-01,  1.22637801421014E-01)
-X( 3) = (  8.55139670805290E+05,  1.39092665637668E+06)
-X( 4) = (  1.36339022746927E+00,  8.62920971881361E-01)
-
-X( 5) = ( -2.51763126043987E-07,  3.68758885472794E-07)
-
-PATH NUMBER =      1526
-
-ARCLEN =  2.45153208208405E+00
-NFE =  361
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999454216028E-01
-
-X( 1) = ( -1.00711983225374E-01, -1.98059013954141E+00)
-X( 2) = ( -4.60415842398653E-01,  6.10548445383949E-02)
-X( 3) = (  3.77491152283698E-01,  2.94171243304242E+00)
-X( 4) = (  8.66129738608703E-01,  1.75644629003421E-03)
-
-X( 5) = (  2.91778692174773E-01,  3.03540234746468E-01)
-
-PATH NUMBER =      1527
-
-ARCLEN =  2.07599419398536E+00
-NFE =  399
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97166375422085E-01
-
-X( 1) = ( -1.55323204206581E-01, -1.57582974648832E-01)
-X( 2) = (  6.22864185335836E-01, -2.74384421060951E-01)
-X( 3) = ( -3.22281846874605E-01,  8.52929912146686E-01)
-X( 4) = (  8.98852075301728E-01,  1.68605702297641E-01)
-
-X( 5) = (  1.61541280811772E-01,  5.53095644832577E-01)
-
-PATH NUMBER =      1528
-
-ARCLEN =  2.39157894135403E+00
-NFE =  469
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99976986562605E-01
-
-X( 1) = ( -1.07387437127692E-01,  2.93807125717859E-01)
-X( 2) = (  6.39131259358702E-01, -1.03857746597248E+00)
-X( 3) = (  8.71312114640684E-01,  9.43580872594091E-01)
-X( 4) = (  7.19880601887283E-01,  1.70350166183812E-01)
-
-X( 5) = ( -2.91776383011256E-01,  2.31656578875807E-01)
-
-PATH NUMBER =      1529
-
-ARCLEN =  2.53522308243365E+00
-NFE =  391
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99783262667913E-01
-
-X( 1) = (  1.60297697457673E-01, -2.33179667842970E-03)
-X( 2) = (  2.96228303510208E-01, -4.18046350692268E-01)
-X( 3) = (  3.18339441014130E-01,  9.18694280296677E-01)
-X( 4) = (  9.39845535555810E-01, -2.18799198712163E-04)
-
-X( 5) = ( -2.60907673481815E-01,  6.11921369888718E-01)
-
-PATH NUMBER =      1530
-
-ARCLEN =  9.96718119024342E+00
-NFE =  369
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999989E-01
-
-X( 1) = (  5.07219013373201E-01, -7.54140767670097E-01)
-X( 2) = (  3.73044355002992E+00, -1.17343030992000E+02)
-X( 3) = (  5.26932365476078E-01,  7.56982193215102E-01)
-X( 4) = (  4.92435562404492E-01, -6.25597826351510E-03)
-
-X( 5) = ( -4.82416033925306E-03, -5.41376612025437E-03)
-
-PATH NUMBER =      1531
-
-ARCLEN =  1.08035324215607E+01
-NFE =  289
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.69919350942588E-01
-
-X( 1) = (  2.54580969764489E-01, -6.34243626503256E-01)
-X( 2) = (  8.90469852189537E-01, -7.36487221295893E-01)
-X( 3) = ( -9.50584377242975E-01,  7.95998027140251E-01)
-X( 4) = (  5.73306766406975E-01,  1.72062294526242E-01)
-
-X( 5) = (  5.61413963733687E-01,  1.00722830173841E+00)
-
-PATH NUMBER =      1532
-
-ARCLEN =  2.26658504916931E+00
-NFE =  517
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92814063058930E-01
-
-X( 1) = (  3.66655866924668E-01, -4.25596579097110E-01)
-X( 2) = (  9.18476272975590E-01, -8.27805820377001E-01)
-X( 3) = ( -7.14254785094550E-01,  6.74957925979735E-01)
-X( 4) = (  5.78091866266314E-01,  1.35715358562364E-01)
-
-X( 5) = ( -3.91285476922436E-01,  1.26391200194722E+00)
-
-PATH NUMBER =      1533
-
-ARCLEN =  2.21829930315742E+00
-NFE =  392
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994320727178E-01
-
-X( 1) = (  7.88498668826699E-01,  2.53320214951357E-01)
-X( 2) = (  1.01709343257434E-01, -1.49813088514092E-01)
-X( 3) = (  1.26294355542966E+00,  1.00322707359698E+00)
-X( 4) = (  7.49570063010795E-01, -7.68220084475001E-02)
-
-X( 5) = ( -2.82856220341933E-01,  1.87681041470025E-01)
-
-PATH NUMBER =      1534
-
-ARCLEN =  5.99462407447783E+00
-NFE =  333
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999229E-01
-
-X( 1) = (  1.13584497695021E-02, -7.93888032704040E-02)
-X( 2) = ( -3.53540926163975E+00,  2.57671942800144E+00)
-X( 3) = (  9.89070728798708E-01, -4.87328210069508E-02)
-X( 4) = (  3.30201197627769E+01, -3.13936965704148E+01)
-
-X( 5) = (  3.07451252897762E-02, -9.11022084190118E-03)
-
-PATH NUMBER =      1535
-
-ARCLEN =  2.30716862044911E+00
-NFE =  295
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99932168185553E-01
-
-X( 1) = (  4.34534406561688E-02,  1.91013965591840E-01)
-X( 2) = ( -5.07874250526217E-01,  4.16445390054355E-02)
-X( 3) = (  1.61853968239575E+00, -3.39426986335157E-02)
-X( 4) = (  9.83772409627408E-01,  1.01842878535474E-01)
-
-X( 5) = ( -8.04672516091680E-01,  4.07040086281076E-02)
-
-PATH NUMBER =      1536
-
-ARCLEN =  6.17993509995367E+00
-NFE =  330
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.32132247936079E-08
-
-X( 1) = (  1.14043436212500E-01, -4.87266783499605E-03)
-X( 2) = ( -2.09939561632074E+07, -9.45388196937424E+05)
-X( 3) = (  1.56043741865589E+07, -5.50488573395926E+06)
-X( 4) = (  9.14646517006989E-01, -2.46168240303288E-04)
-
-X( 5) = ( -4.26928629222115E-09, -3.92879430871434E-08)
-
-PATH NUMBER =      1537
-
-ARCLEN =  6.82933987119706E+00
-NFE =  216
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.88253324479484E-13
-
-X( 1) = ( -1.39002632459221E+13,  9.29698908807006E+12)
-X( 2) = ( -2.59260793922829E+13, -2.79201229560708E+13)
-X( 3) = (  2.49294048219845E+13,  2.16118146884538E+13)
-X( 4) = (  4.93748207304338E-01,  3.62418470863758E-03)
-
-X( 5) = ( -4.74614922016392E-14,  6.17198349719961E-15)
-
-PATH NUMBER =      1538
-
-ARCLEN =  9.22793404117759E+01
-NFE =  501
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99806038387784E-01
-
-X( 1) = (  7.45583340935379E-02, -5.40711724071518E-01)
-X( 2) = ( -6.30703879032202E-01, -1.65261130522510E+00)
-X( 3) = (  6.63109613864536E-01,  6.02204445793690E-01)
-X( 4) = (  6.71056224627963E-01, -1.50363960093990E-01)
-
-X( 5) = ( -3.12907967004221E-01, -5.83739438488845E-01)
-
-PATH NUMBER =      1539
-
-ARCLEN =  5.96039933337430E+00
-NFE =  329
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99939600702534E-01
-
-X( 1) = (  8.80040587484721E-01, -2.67639217843313E-02)
-X( 2) = (  3.40906004859747E-02, -5.32842516519512E-01)
-X( 3) = (  8.38536495563137E-01,  2.35915316949521E-01)
-X( 4) = (  1.11795564221953E-01,  4.00685420777574E-02)
-
-X( 5) = ( -4.44775659349884E-01,  2.26605712486278E-02)
-
-PATH NUMBER =      1540
-
-ARCLEN =  3.77229132936109E+00
-NFE =  407
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87713382775971E-01
-
-X( 1) = (  9.58777040172488E-01, -4.57991534416325E-03)
-X( 2) = (  1.76380624685159E+00, -1.04726771226326E-01)
-X( 3) = ( -1.08424561164904E+00, -1.34774519585072E-01)
-X( 4) = ( -4.66747093623258E-02, -2.73690592225112E-02)
-
-X( 5) = ( -2.99847030228498E-01,  4.76581259959985E-01)
-
-PATH NUMBER =      1541
-
-ARCLEN =  2.97832844179040E+00
-NFE =  408
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99860451223431E-01
-
-X( 1) = (  9.63832493555882E-01,  1.74364569846856E-02)
-X( 2) = (  9.23035592130847E-02, -3.53955554159198E-01)
-X( 3) = (  4.99811405512412E-01,  5.82249755489480E-01)
-X( 4) = (  8.48822408244198E-02, -4.70436070118110E-01)
-
-X( 5) = ( -4.57254807567015E-01,  2.82080291073673E-01)
-
-PATH NUMBER =      1542
-
-ARCLEN =  5.15592186216715E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999977E-01
-
-X( 1) = (  9.78995672175381E-01, -1.13356349682349E-01)
-X( 2) = (  2.41432156697112E+02, -2.89026841560566E+02)
-X( 3) = ( -2.65417668344490E-02, -1.31641545631129E-01)
-X( 4) = (  5.16740406772926E+00,  4.75748497931349E+02)
-
-X( 5) = ( -1.32737726500008E-03, -4.07205852191679E-04)
-
-PATH NUMBER =      1543
-
-ARCLEN =  1.90186412370348E+00
-NFE =  348
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999987E-01
-
-X( 1) = ( -1.68854021670937E-01, -1.38577109163486E-01)
-X( 2) = (  8.29610770340685E-01, -2.27268552556603E-01)
-X( 3) = ( -5.32829457437449E+00,  2.47504840465193E+01)
-X( 4) = (  5.08008190968770E-01, -7.79686131340025E-02)
-
-X( 5) = (  4.44301728759524E-03,  2.76631343716157E-02)
-
-PATH NUMBER =      1544
-
-ARCLEN =  2.09758278320524E+00
-NFE =  459
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99929160707669E-01
-
-X( 1) = (  2.60116502952087E-01,  2.27903677261816E-01)
-X( 2) = ( -6.75687299302382E-01, -5.52013956157704E-01)
-X( 3) = (  1.43981969061851E+00,  4.26158877806933E-01)
-X( 4) = (  7.63623276638453E-01, -1.70899442515253E-01)
-
-X( 5) = ( -6.48883422583386E-01,  6.77027848658593E-02)
-
-PATH NUMBER =      1545
-
-ARCLEN =  4.10888062889231E+00
-NFE =  375
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99051768104300E-01
-
-X( 1) = ( -9.99074832566072E-02,  5.27908301030010E-01)
-X( 2) = ( -7.69989977427697E-01,  2.09720950869277E-01)
-X( 3) = (  1.00694009390525E+00,  3.10426663354806E-01)
-X( 4) = (  7.27203052951883E-01, -9.34485803792064E-02)
-
-X( 5) = ( -2.16546524371066E-02,  8.16957842856772E-01)
-
-PATH NUMBER =      1546
-
-ARCLEN =  6.79602324256764E+00
-NFE =  265
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.09950605156274E-10
-
-X( 1) = (  1.98006125658439E+09, -7.42703829604039E+08)
-X( 2) = (  4.92169326922172E-01, -2.91793255272215E-01)
-X( 3) = ( -2.09860155520619E+09, -4.99763945407063E+08)
-X( 4) = ( -2.11533579939127E+09,  4.44202253162041E+07)
-
-X( 5) = (  1.07952025844935E-10, -6.66425892931460E-10)
-
-PATH NUMBER =      1547
-
-ARCLEN =  3.11970796899126E+00
-NFE =  246
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.07215405736535E-06
-
-X( 1) = ( -1.11028450908772E-01,  1.43367319668904E-01)
-X( 2) = (  3.20593294901908E+00, -1.60772571444023E+00)
-X( 3) = (  6.90919285398379E+05, -7.29312780651531E+05)
-X( 4) = (  8.65826970726194E-01,  8.49905967101412E-02)
-
-X( 5) = ( -4.73337293248419E-07, -5.50067959458414E-07)
-
-PATH NUMBER =      1548
-
-ARCLEN =  4.56435419801515E+00
-NFE =  319
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97038876332593E-01
-
-X( 1) = (  2.84690996565375E-01, -3.45938953186069E-01)
-X( 2) = (  1.29629776322287E+00, -7.70285127965111E-01)
-X( 3) = ( -1.51956454899249E+00,  8.23624917896163E-01)
-X( 4) = (  5.19615061560669E-01,  1.30565086651184E-01)
-
-X( 5) = (  2.36760748937759E-01,  5.72272565623209E-01)
-
-PATH NUMBER =      1549
-
-ARCLEN =  2.57422902034228E+00
-NFE =  285
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.83219788664472E-10
-
-X( 1) = (  6.35494532052000E-01, -3.50689298675928E-03)
-X( 2) = ( -2.44971712062600E+09, -3.29562882789668E+09)
-X( 3) = (  2.87670981457351E+09,  1.61448667548242E+09)
-X( 4) = ( -1.70029762257164E+00,  2.48611659575364E-01)
-
-X( 5) = ( -1.63492347833799E-10, -1.06217889572855E-10)
-
-PATH NUMBER =      1550
-
-ARCLEN =  1.71132822600602E+00
-NFE =  348
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.17735784837736E-07
-
-X( 1) = (  4.98693183282214E-01,  2.26365143335342E-01)
-X( 2) = ( -1.43457234618290E+07,  3.96988238722849E+06)
-X( 3) = (  9.30079833282132E+06, -7.13119521476280E+06)
-X( 4) = (  5.00427720137032E-01, -2.36195566885734E-01)
-
-X( 5) = (  1.14526944140292E-08, -5.46071832081005E-08)
-
-PATH NUMBER =      1551
-
-ARCLEN =  1.25928127590676E+00
-NFE =  232
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99135542548337E-01
-
-X( 1) = (  4.44253854071038E-01,  6.16812877141586E-01)
-X( 2) = (  9.44005953814142E-01, -9.06723603969725E-02)
-X( 3) = ( -2.34737129423003E-01,  3.50707881158519E-01)
-X( 4) = (  5.35335007408189E-02, -1.41758949273416E-02)
-
-X( 5) = ( -1.42380949128777E-01,  3.36385940216906E-01)
-
-PATH NUMBER =      1552
-
-ARCLEN =  1.82349993012189E+00
-NFE =  268
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.47295645236545E-07
-
-X( 1) = ( -4.65131867049608E+05, -1.15533315266979E+06)
-X( 2) = (  1.12816986201875E+00, -4.25038354285213E-02)
-X( 3) = ( -4.48041550042962E+05, -1.02964086655449E+06)
-X( 4) = ( -3.74580797075506E-02,  8.89245604974940E-03)
-
-X( 5) = (  1.85625109576989E-07, -2.50685658717553E-07)
-
-PATH NUMBER =      1553
-
-ARCLEN =  1.31568157454249E+00
-NFE =  316
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999315233624E-01
-
-X( 1) = ( -2.95144998771927E+00,  1.60871661889932E+00)
-X( 2) = (  1.10709671277113E+00, -6.90840149902264E-02)
-X( 3) = ( -1.53586396148886E+00,  3.52006346533979E+00)
-X( 4) = (  4.23844289358088E-02, -2.17261598217610E-02)
-
-X( 5) = (  3.37385511119647E-02,  8.42263599068768E-02)
-
-PATH NUMBER =      1554
-
-ARCLEN =  1.57032207585647E+00
-NFE =  163
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.26816177438640E-14
-
-X( 1) = ( -9.48535344969856E+10, -2.57508871468769E+12)
-X( 2) = (  4.32225153112205E+12,  3.25280413667228E+12)
-X( 3) = ( -6.25357019511673E+12, -2.35689240244800E+12)
-X( 4) = (  4.95734690579307E-01, -6.53964792665178E-04)
-
-X( 5) = (  1.13604953352539E-13,  2.28251662362511E-15)
-
-PATH NUMBER =      1555
-
-ARCLEN =  2.35096365977815E+00
-NFE =  107
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.54444037014709E-14
-
-X( 1) = ( -1.09417350380538E+13,  1.46641216127902E+13)
-X( 2) = ( -4.16272267492368E+13, -8.57184051489976E+12)
-X( 3) = (  4.71221744925840E+13,  2.03232169262150E+13)
-X( 4) = (  5.02617631804346E-01, -3.88856018930313E-03)
-
-X( 5) = ( -3.05789735980527E-14,  1.08680967871033E-14)
-
-PATH NUMBER =      1556
-
-ARCLEN =  2.50716321983253E+00
-NFE =  301
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97671084712775E-01
-
-X( 1) = (  5.23810588455615E-01,  3.89654175488306E-01)
-X( 2) = (  9.64258632382630E-01, -1.64960505729901E-01)
-X( 3) = ( -5.02027164748540E-01, -5.57329771272955E-02)
-X( 4) = (  1.29938495988856E-01, -3.35212564312278E-02)
-
-X( 5) = ( -2.36377437933472E-01,  5.34826352879234E-01)
-
-PATH NUMBER =      1557
-
-ARCLEN =  1.09768850238976E+01
-NFE =  252
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.81613884151619E-01
-
-X( 1) = (  1.08949209686254E+00, -1.84125032981743E-01)
-X( 2) = (  2.40877925288011E+00,  9.23370002677331E-01)
-X( 3) = ( -1.52327636314842E+00, -1.71380519785571E+00)
-X( 4) = (  6.77306322288087E-02, -9.99421761024492E-02)
-
-X( 5) = ( -2.47045958920803E-01,  2.23442409549846E+00)
-
-PATH NUMBER =      1558
-
-ARCLEN =  1.71603269019676E+00
-NFE =  369
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97035976018707E-01
-
-X( 1) = (  7.32774543264931E-01,  1.68186909679073E-01)
-X( 2) = (  1.03892638363567E+00, -1.30714295189190E-01)
-X( 3) = ( -9.22642213051457E-02,  3.82802018125716E-02)
-X( 4) = ( -3.10426506170774E-01, -7.69145082241527E-01)
-
-X( 5) = ( -2.55163532041723E-01,  3.92055072384512E-01)
-
-PATH NUMBER =      1559
-
-ARCLEN =  1.38280731445710E+00
-NFE =  260
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97757914154831E-01
-
-X( 1) = (  7.45023479017526E-01,  4.08302868598773E-01)
-X( 2) = (  1.09522461508904E+00, -4.56457891914651E-02)
-X( 3) = ( -5.49207163417444E-02,  6.34956156997833E-02)
-X( 4) = ( -1.80990310128754E-01, -6.10851403807015E-01)
-
-X( 5) = ( -2.16263433085377E-01,  3.27418160755440E-01)
-
-PATH NUMBER =      1560
-
-ARCLEN =  1.28236631258005E+00
-NFE =  268
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98116004171043E-01
-
-X( 1) = (  5.79303677188254E-01,  6.67858798874676E-01)
-X( 2) = (  1.02761555076999E+00,  3.34488251471287E-02)
-X( 3) = (  8.45461983834120E-03,  1.59416156284817E-01)
-X( 4) = ( -2.63042397390711E-02, -3.42120068258873E-01)
-
-X( 5) = ( -1.67554174797894E-01,  3.00587681570317E-01)
-
-PATH NUMBER =      1561
-
-ARCLEN =  1.24242915176902E+00
-NFE =  276
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99970027903783E-01
-
-X( 1) = (  2.75759650724418E-01,  9.79165338922912E-01)
-X( 2) = (  8.13075293691945E-01,  1.53826506318737E-02)
-X( 3) = (  2.62400092575828E-01,  8.48778649356553E-01)
-X( 4) = ( -1.94119667569648E-01, -4.87359018760700E-02)
-
-X( 5) = ( -9.24684017346998E-02,  2.20270572294966E-01)
-
-PATH NUMBER =      1562
-
-ARCLEN =  1.68408692683887E+00
-NFE =  399
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999892494E-01
-
-X( 1) = ( -2.59102683142435E+00,  4.83403611309734E+00)
-X( 2) = (  7.17942995059865E-01, -5.43374587005982E-02)
-X( 3) = (  5.51729075629479E-01,  7.06704081017635E-01)
-X( 4) = ( -3.32284262962344E-01, -9.28830459739419E-02)
-
-X( 5) = ( -5.15555696350237E-03,  9.93566743386686E-02)
-
-PATH NUMBER =      1563
-
-ARCLEN =  1.69787047595980E+00
-NFE =  220
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.00357259341379E-07
-
-X( 1) = ( -2.17889562462601E+07,  2.45044207833333E+06)
-X( 2) = (  1.62335802543584E+00, -8.65140135968486E-01)
-X( 3) = ( -1.09513891936847E+07,  5.88331182784472E+06)
-X( 4) = (  1.65313582506204E-01, -1.21658807093365E-01)
-
-X( 5) = (  1.82553051472070E-08,  1.07538524338137E-08)
-
-PATH NUMBER =      1564
-
-ARCLEN =  5.24761021655193E+01
-NFE =  424
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.31149150860505E-12
-
-X( 1) = ( -2.67559075218562E+12, -2.16605528520989E+12)
-X( 2) = (  2.71941389482848E+12, -6.63617363328387E+12)
-X( 3) = ( -1.37611321291068E+12,  3.99478395273264E+12)
-X( 4) = (  5.04387919882188E-01,  4.85068907015963E-04)
-
-X( 5) = ( -7.42843856088929E-13,  2.14231464599340E-13)
-
-PATH NUMBER =      1565
-
-ARCLEN =  2.07725813411739E+00
-NFE =  332
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97861891672601E-01
-
-X( 1) = (  5.41681885282223E-01,  4.39440259129849E-01)
-X( 2) = (  8.93421246272081E-01, -5.86874335589863E-02)
-X( 3) = ( -1.14723874157001E-01,  4.99950611750776E-02)
-X( 4) = ( -3.59871133347986E-01, -5.36833589921391E-01)
-
-X( 5) = ( -1.74081108629795E-01,  3.79613665544175E-01)
-
-PATH NUMBER =      1566
-
-ARCLEN =  1.84630506946949E+01
-NFE =  420
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98977983423225E-01
-
-X( 1) = (  1.11458836651103E+00, -1.51064031618452E-01)
-X( 2) = (  1.79500636251101E+00,  1.57325066916345E+00)
-X( 3) = (  3.20363637807223E-01, -2.26808543277267E+00)
-X( 4) = (  7.32775076304349E-02, -5.73802742042311E-02)
-
-X( 5) = ( -6.15931170108913E-01, -1.16711341729748E-01)
-
-PATH NUMBER =      1567
-
-ARCLEN =  4.80620104435184E+00
-NFE =  193
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.13321437283562E-14
-
-X( 1) = (  5.07646751611328E-01,  1.56942445035668E-02)
-X( 2) = (  3.27903701998369E+13,  1.46092388652280E+14)
-X( 3) = ( -4.74130242956232E+13, -7.10863807313966E+13)
-X( 4) = (  2.92908015551040E+13,  4.41276454965427E+13)
-
-X( 5) = (  6.99871475877412E-15,  1.82829012346231E-15)
-
-PATH NUMBER =      1568
-
-ARCLEN =  2.62005943940838E+00
-NFE =  490
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99571726481126E-01
-
-X( 1) = (  8.82990236016502E-01,  1.03062808637114E-02)
-X( 2) = (  1.44182328693927E+00, -1.29781665834670E+00)
-X( 3) = ( -3.70789420642070E-01,  4.23556796422201E-01)
-X( 4) = ( -8.67508760922134E-02,  1.12544893437605E-01)
-
-X( 5) = ( -3.43624595177935E-01,  1.26815358809425E-01)
-
-PATH NUMBER =      1569
-
-ARCLEN =  1.27745968592199E+00
-NFE =  254
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98034844354269E-01
-
-X( 1) = (  2.17591158519048E-01,  5.70563887998671E-01)
-X( 2) = (  1.02573350151333E+00, -5.96702842068287E-02)
-X( 3) = ( -1.60354009841978E-01,  1.77677891589886E-01)
-X( 4) = (  2.95992371344723E-01, -2.54904543633366E-01)
-
-X( 5) = ( -1.15019615563099E-01,  3.87572420182998E-01)
-
-PATH NUMBER =      1570
-
-ARCLEN =  1.67729235277810E+00
-NFE =  350
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998728411872E-01
-
-X( 1) = (  9.16693806935231E-01,  1.07958435950718E+00)
-X( 2) = (  7.62460672829440E-01, -1.11011079983313E-01)
-X( 3) = ( -5.89645320293561E-02,  1.28402610802799E+00)
-X( 4) = ( -1.45355447377986E-01, -1.75274879238262E-01)
-
-X( 5) = ( -9.71106207822855E-02,  1.95456832002502E-01)
-
-PATH NUMBER =      1571
-
-ARCLEN =  1.22821750262625E+00
-NFE =  106
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.97083673718656E-13
-
-X( 1) = ( -4.27637896325755E+10, -1.35125930383281E+12)
-X( 2) = (  5.36593526701442E-01, -3.14898687538113E-01)
-X( 3) = ( -1.50304795538074E+12, -4.27948953104678E+11)
-X( 4) = (  5.01533695079180E+11,  8.28170847623119E+11)
-
-X( 5) = (  1.88286506611762E-13, -1.93454573107349E-13)
-
-PATH NUMBER =      1572
-
-ARCLEN =  1.34335880184018E+01
-NFE =  451
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999846113E-01
-
-X( 1) = (  1.60925410160884E-01,  3.67930543640335E-02)
-X( 2) = (  1.37542894328474E+00,  1.11292518212834E-01)
-X( 3) = ( -3.72316364712883E+00, -4.05509271806229E+00)
-X( 4) = ( -8.88806892141600E+00,  2.10600835392089E+01)
-
-X( 5) = ( -8.94638446998698E-02, -4.11579533402859E-02)
-
-PATH NUMBER =      1573
-
-ARCLEN =  2.88981183018039E+00
-NFE =  470
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.14083163709945E-06
-
-X( 1) = ( -1.80179309137488E+05, -3.02879222424742E+05)
-X( 2) = (  5.59993447118273E-01, -1.11436888878430E+00)
-X( 3) = (  4.83516607230445E-01,  5.67780010165008E-01)
-X( 4) = (  4.95478422149006E-01, -1.38613542869696E-01)
-
-X( 5) = (  1.68138619865562E-06, -1.19669822311146E-06)
-
-PATH NUMBER =      1574
-
-ARCLEN =  1.92669211247289E+00
-NFE =  310
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.12131460407238E-07
-
-X( 1) = (  1.63215195374049E+05, -5.07136150440881E+05)
-X( 2) = (  4.82930973670843E-01,  1.10143465471664E-01)
-X( 3) = (  2.19284205446560E+04, -6.90536950222133E+05)
-X( 4) = (  6.78505812628144E-01, -9.73729843062773E-01)
-
-X( 5) = (  3.24495489730143E-08, -5.94868074070391E-07)
-
-PATH NUMBER =      1575
-
-ARCLEN =  3.11925691864620E+01
-NFE =  384
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.25888802087665E-12
-
-X( 1) = (  1.70686226632701E+12, -9.94418889724686E+11)
-X( 2) = (  2.70439065399811E+12,  2.19264120437355E+12)
-X( 3) = ( -4.10393115410417E+11, -1.21426189440283E+12)
-X( 4) = (  5.19510657182479E-01,  1.14917455074496E-02)
-
-X( 5) = ( -5.63701131129149E-13,  5.63711403944733E-14)
-
-PATH NUMBER =      1576
-
-ARCLEN =  1.50463648630338E+00
-NFE =  357
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90458157885574E-01
-
-X( 1) = (  2.57667804045514E-01, -4.89865173716128E-02)
-X( 2) = (  9.92659959657797E-01,  9.68096493533656E-03)
-X( 3) = ( -3.61218785843264E-01,  4.72274680129538E-01)
-X( 4) = (  2.19435353508005E-01, -7.01162979062116E-01)
-
-X( 5) = (  3.03108362829699E-02,  4.55556774900630E-01)
-
-PATH NUMBER =      1577
-
-ARCLEN =  1.18845816374073E+00
-NFE =  230
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97983385893810E-01
-
-X( 1) = ( -1.49783836612428E-01,  3.34602744496758E-01)
-X( 2) = (  1.01588304540025E+00,  3.84930877076236E-03)
-X( 3) = ( -4.22276307989591E-02,  8.99163906574939E-02)
-X( 4) = (  6.14862546040469E-01, -5.54296975593414E-01)
-
-X( 5) = (  7.97626382593286E-03,  4.73645421514169E-01)
-
-PATH NUMBER =      1578
-
-ARCLEN =  1.84097117107919E+00
-NFE =  342
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99945255113256E-01
-
-X( 1) = ( -8.71037413872973E-01,  4.65869393794011E-01)
-X( 2) = (  5.81287232874660E-01,  3.27104571741409E-01)
-X( 3) = (  1.15818181263302E-01, -1.64966464149556E-01)
-X( 4) = (  9.85815608255331E-01, -1.81213264099750E-01)
-
-X( 5) = (  2.23599626184092E-01,  3.67975575414385E-01)
-
-PATH NUMBER =      1579
-
-ARCLEN =  2.05372426138213E+00
-NFE =  543
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999982799097E-01
-
-X( 1) = (  1.64229206027904E+00,  1.10010691565567E+01)
-X( 2) = (  7.62746341888628E+00,  3.39115029101535E+00)
-X( 3) = (  1.02627982964335E+00,  2.44644212317447E-03)
-X( 4) = (  1.72974500635836E-02,  7.75608064637276E-03)
-
-X( 5) = ( -1.95686459510547E-02,  3.26561985237683E-02)
-
-PATH NUMBER =      1580
-
-ARCLEN =  1.13343328412949E+00
-NFE =   77
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.95755471353486E-13
-
-X( 1) = (  1.79562050613757E+12, -1.64593351592498E+12)
-X( 2) = (  5.24043196518292E-01, -3.02235739099346E-01)
-X( 3) = ( -1.66228177981452E+12, -2.71112395196016E+12)
-X( 4) = ( -8.73138010077478E+11,  1.65421996132865E+12)
-
-X( 5) = ( -1.94397449526651E-16, -1.50350652067255E-13)
-
-PATH NUMBER =      1581
-
-ARCLEN =  1.38547724015732E+00
-NFE =  144
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.92267654072967E-12
-
-X( 1) = ( -1.23887656272549E+10, -1.08775333561193E+11)
-X( 2) = (  4.68826819431175E-01, -2.97606243973399E-01)
-X( 3) = ( -1.42769740569798E+11, -2.06739004198586E+10)
-X( 4) = (  8.89370645956904E+10,  3.67993143692539E+10)
-
-X( 5) = (  2.32135046861898E-12, -1.72799052627556E-12)
-
-PATH NUMBER =      1582
-
-ARCLEN =  1.53385470402589E+00
-NFE =  304
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98599860207048E-01
-
-X( 1) = ( -4.55657821081044E-01,  1.94946063813012E-01)
-X( 2) = (  8.04531597044492E-01,  1.76199619354542E-02)
-X( 3) = ( -2.68206539669996E-02,  2.05619285169948E-01)
-X( 4) = (  6.57454125459870E-01, -3.67989011363729E-01)
-
-X( 5) = (  1.29023775079365E-01,  4.52577088921500E-01)
-
-PATH NUMBER =      1583
-
-ARCLEN =  1.59770802217337E+00
-NFE =  167
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.63004456446816E-12
-
-X( 1) = (  2.57141354120672E+09,  1.11996489810673E+09)
-X( 2) = (  5.01126462722558E-01, -2.92383444878965E-01)
-X( 3) = (  2.38215946648571E+09, -7.29509636720366E+08)
-X( 4) = ( -1.51387932805081E+09,  1.22630342728767E+09)
-
-X( 5) = ( -1.22039102320960E-10, -1.04298823267249E-11)
-
-PATH NUMBER =      1584
-
-ARCLEN =  4.42603543455347E+00
-NFE =  331
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999413E-01
-
-X( 1) = (  1.00516516571735E+00,  2.35572618250253E-02)
-X( 2) = ( -7.29144591214743E-02,  1.23808133689872E-01)
-X( 3) = (  6.42851940828456E+00,  1.72459130435373E+01)
-X( 4) = (  2.87277181709298E+01, -5.86797960171647E+01)
-
-X( 5) = (  2.04871847540384E-02,  1.73239934413346E-02)
-
-PATH NUMBER =      1585
-
-ARCLEN =  1.26271887753147E+00
-NFE =  269
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97929006465675E-01
-
-X( 1) = ( -6.65863326141089E-02,  1.62046846133161E-03)
-X( 2) = (  1.01972472348411E+00, -7.37736767679202E-02)
-X( 3) = ( -2.09862260355334E-01,  5.19269382036440E-01)
-X( 4) = (  7.18904976403757E-01, -9.50317803265087E-01)
-
-X( 5) = (  9.50217995440311E-02,  4.27621227693295E-01)
-
-PATH NUMBER =      1586
-
-ARCLEN =  1.11905668266130E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97049513002061E-01
-
-X( 1) = ( -8.11707081579382E-02,  2.19782355160582E-02)
-X( 2) = (  1.01363073527375E+00,  6.63575794564418E-02)
-X( 3) = ( -1.20150834017904E-01,  7.60669828657630E-01)
-X( 4) = (  6.35031046009736E-01, -6.43653044573748E-01)
-
-X( 5) = (  3.98365457712060E-02,  3.70021630804781E-01)
-
-PATH NUMBER =      1587
-
-ARCLEN =  1.27936760266217E+00
-NFE =  299
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98520814685677E-01
-
-X( 1) = (  6.48339837996249E-02,  5.20342099874983E-01)
-X( 2) = (  8.84325033196767E-01,  4.01150520494340E-01)
-X( 3) = (  1.28286397870707E-01,  5.26849678641594E-01)
-X( 4) = (  5.32745906005722E-01, -5.57357793735152E-01)
-
-X( 5) = ( -2.08337406548215E-02,  3.19339511189328E-01)
-
-PATH NUMBER =      1588
-
-ARCLEN =  1.41606566786010E+00
-NFE =  331
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98320458701045E-01
-
-X( 1) = ( -2.78921062571854E-01, -1.04006289455091E-01)
-X( 2) = (  7.60323938195094E-01,  7.32295844955198E-02)
-X( 3) = ( -2.49202940460947E-01,  5.48734271033598E-01)
-X( 4) = (  7.99184568140841E-01, -5.09490678436923E-01)
-
-X( 5) = (  1.95185418434433E-01,  3.95409361169111E-01)
-
-PATH NUMBER =      1589
-
-ARCLEN =  2.50725366943592E+00
-NFE =  295
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.16878452822714E-13
-
-X( 1) = ( -2.45236169231170E+11, -3.85568146039399E+11)
-X( 2) = (  4.29853092271201E+11,  2.66324892639607E+11)
-X( 3) = ( -8.74791941428509E+11, -4.45753849776456E+11)
-X( 4) = (  5.03297244319680E-01,  5.44577323967641E-03)
-
-X( 5) = (  6.11744704372141E-13, -1.32896460763171E-13)
-
-PATH NUMBER =      1590
-
-ARCLEN =  1.18364751968272E+00
-NFE =  136
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.39407314986099E-12
-
-X( 1) = ( -1.21933561571132E+11,  4.67584306309165E+10)
-X( 2) = (  4.95201950052991E-01, -2.80222027649902E-01)
-X( 3) = (  5.54884820722323E+10,  1.76338901146374E+11)
-X( 4) = (  3.10568147915644E+10, -8.71850154109327E+10)
-
-X( 5) = (  6.45350418070068E-13,  2.52834954578632E-12)
-
-PATH NUMBER =      1591
-
-ARCLEN =  2.21091946391636E+00
-NFE =  276
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.78011787261458E-07
-
-X( 1) = (  7.11281519127621E-01,  1.07683965041031E+00)
-X( 2) = (  4.82916489276503E-01, -1.12716634213156E-01)
-X( 3) = (  5.47191505045773E+05,  9.61791223674097E+05)
-X( 4) = ( -7.19920591775318E+05, -1.46757416598512E+06)
-
-X( 5) = ( -5.17051858535487E-08,  4.79549796154248E-07)
-
-PATH NUMBER =      1592
-
-ARCLEN =  2.03804663489731E+00
-NFE =  192
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.31661493273965E-07
-
-X( 1) = ( -1.16187842548413E+06, -1.15354587188760E+06)
-X( 2) = ( -1.93920002266301E-01,  5.59649043608508E-02)
-X( 3) = ( -1.75206817315387E+06, -5.26495026750025E+05)
-X( 4) = (  9.44208931235665E-01,  5.48050496788992E-03)
-
-X( 5) = (  2.00937798796929E-07, -6.25628539771854E-08)
-
-PATH NUMBER =      1593
-
-ARCLEN =  2.28343023460580E+00
-NFE =  214
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.79072367437431E-08
-
-X( 1) = ( -1.06159333206771E+06, -2.77575732959374E+06)
-X( 2) = (  4.85948466117050E-01, -2.50015830717089E-01)
-X( 3) = (  1.58026878107425E+07,  1.11516182663530E+07)
-X( 4) = ( -1.46958311099787E+07, -2.08384143791047E+07)
-
-X( 5) = ( -1.60716828733766E-08,  3.23375949256091E-08)
-
-PATH NUMBER =      1594
-
-ARCLEN =  5.47572258217061E+00
-NFE =  287
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97728843257916E-01
-
-X( 1) = ( -1.96611112989124E-01, -7.87740426733571E-01)
-X( 2) = (  6.86231086012011E-01, -7.02585470868885E-01)
-X( 3) = ( -1.64977235384075E-01,  2.29842537071578E-01)
-X( 4) = (  9.95765017942532E-01,  6.25584342752332E-02)
-
-X( 5) = (  1.47025728608746E+00, -1.16410069549649E+00)
-
-PATH NUMBER =      1595
-
-ARCLEN =  1.79278005590418E+00
-NFE =  249
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99422309424356E-01
-
-X( 1) = ( -3.76082018317225E-01, -3.48909905999907E-01)
-X( 2) = (  8.83062651563507E-01, -1.27926462379069E-01)
-X( 3) = ( -3.81262757368702E-01,  4.73032549127074E-01)
-X( 4) = (  1.38090211234454E+00,  2.95106323499469E-01)
-
-X( 5) = (  4.62901632554644E-01,  5.41247882452738E-01)
-
-PATH NUMBER =      1596
-
-ARCLEN =  1.15491406772346E+00
-NFE =  366
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.88361161268329E-01
-
-X( 1) = ( -4.09080952741972E-01, -1.04402594157903E-01)
-X( 2) = (  6.07455513079170E-01, -5.81200976638160E-02)
-X( 3) = ( -2.65563940614288E-01,  8.23527558556547E-01)
-X( 4) = (  1.14814126317561E+00, -7.92105186215112E-02)
-
-X( 5) = (  2.17394260217482E-01,  3.93428409860525E-01)
-
-PATH NUMBER =      1597
-
-ARCLEN =  1.76281785909740E+00
-NFE =  329
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.97340894300795E-06
-
-X( 1) = ( -1.75108507533682E-01, -1.28293188257659E-01)
-X( 2) = (  5.47173916589420E-01, -6.94017103077541E-02)
-X( 3) = ( -2.19818223437308E+04,  7.01815982497602E+04)
-X( 4) = (  9.19247772572288E-01, -2.03969529854933E-01)
-
-X( 5) = (  2.50747238032543E-06,  9.59062006815602E-06)
-
-PATH NUMBER =      1598
-
-ARCLEN =  1.36373177342586E+00
-NFE =  103
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.67642533109303E-13
-
-X( 1) = (  7.24207388757885E+11, -1.20856633188697E+12)
-X( 2) = (  5.10282023282920E-01,  2.84986672208017E-01)
-X( 3) = ( -1.54818228447851E+12, -1.33248714707700E+12)
-X( 4) = ( -5.26957418170479E+11,  1.17229015355994E+12)
-
-X( 5) = (  8.01017780750757E-14, -2.45602203938905E-13)
-
-PATH NUMBER =      1599
-
-ARCLEN =  1.94935779022787E+00
-NFE =  212
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.65893076959300E-10
-
-X( 1) = (  9.54517714515692E+08, -3.64681236247302E+07)
-X( 2) = (  4.76091195091084E-01, -2.75454744259751E-01)
-X( 3) = (  5.21891974712434E+08, -7.55787013851058E+08)
-X( 4) = ( -1.42852655784810E+09, -2.05987928678760E+08)
-
-X( 5) = ( -4.09415052912438E-10, -1.59646288864449E-10)
-
-PATH NUMBER =      1600
-
-ARCLEN =  1.97275908635812E+00
-NFE =  283
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999993313E-01
-
-X( 1) = ( -4.04293238242703E+01, -2.56665539853411E+00)
-X( 2) = ( -1.04526845053728E-02, -5.68801150998886E-02)
-X( 3) = ( -2.30521977264497E+01,  5.73727156261251E+00)
-X( 4) = (  9.96694283809930E-01,  1.01458217345251E-02)
-
-X( 5) = (  1.06305832597784E-02,  3.64900291441303E-03)
-
-PATH NUMBER =      1601
-
-ARCLEN =  2.00220675499934E+00
-NFE =  315
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.39974849906333E-07
-
-X( 1) = (  8.53198188733660E+05, -2.50840370060665E+06)
-X( 2) = ( -2.98043519455050E-02, -1.54238171117263E-01)
-X( 3) = ( -3.28468845378704E+06,  1.12181476165122E+06)
-X( 4) = (  9.45815826302415E-01,  4.05801542374815E-02)
-
-X( 5) = (  1.82216843036466E-07, -7.20494404131303E-08)
-
-PATH NUMBER =      1602
-
-ARCLEN =  3.08216039928800E+00
-NFE =  195
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.61837242408425E-08
-
-X( 1) = (  4.80553687362608E+07, -7.89793541622958E+07)
-X( 2) = (  5.11297067069576E-01, -2.77358926128076E-01)
-X( 3) = ( -3.76195424364385E+07,  9.95306482463681E+07)
-X( 4) = (  1.73225590814793E+07, -8.20090555946427E+07)
-
-X( 5) = (  1.17065131575588E-08,  3.89985414003379E-09)
-
-PATH NUMBER =      1603
-
-ARCLEN =  2.77643292743921E+00
-NFE =  262
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.57822222117153E-06
-
-X( 1) = ( -5.87926089588558E-02,  2.29324072379977E-03)
-X( 2) = (  1.26732790500898E+00, -2.60083410349167E-01)
-X( 3) = ( -2.17806950069481E+04, -1.99436377076540E+05)
-X( 4) = (  1.15547604704481E+00,  4.17075905161234E-01)
-
-X( 5) = (  5.66712596025801E-07, -3.58946194669115E-06)
-
-PATH NUMBER =      1604
-
-ARCLEN =  2.45528439197616E+00
-NFE =  444
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999971288037E-01
-
-X( 1) = ( -2.20441392819007E-02,  6.64120473105998E-04)
-X( 2) = (  1.09444225264027E+00, -3.09059885722149E-03)
-X( 3) = (  2.19655841866208E+00,  7.89267387781632E+00)
-X( 4) = (  4.89874629150670E+00, -3.52620421735003E+00)
-
-X( 5) = ( -7.38049830673959E-03,  9.26388882470049E-02)
-
-PATH NUMBER =      1605
-
-ARCLEN =  1.19478720360886E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99305974492165E-01
-
-X( 1) = ( -7.45271206570427E-02,  2.11289660624462E-02)
-X( 2) = (  6.31041259377350E-01, -1.59105524638315E-01)
-X( 3) = ( -1.21650007247061E-01,  1.23255021674916E+00)
-X( 4) = (  1.03879635773382E+00, -5.03543609779116E-02)
-
-X( 5) = (  3.63705059034362E-02,  4.05340115836361E-01)
-
-PATH NUMBER =      1606
-
-ARCLEN =  1.12757975594233E+00
-NFE =  233
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97932917252342E-01
-
-X( 1) = ( -2.04051714031431E-01,  3.37787784281512E-02)
-X( 2) = (  4.51642381234711E-01, -8.66559218938353E-04)
-X( 3) = ( -1.40388737864579E-01,  1.23421260736909E+00)
-X( 4) = (  1.03681166441854E+00,  7.67581332696407E-02)
-
-X( 5) = (  9.16006541845967E-02,  3.75382133447755E-01)
-
-PATH NUMBER =      1607
-
-ARCLEN =  1.69389942904928E+00
-NFE =  232
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.53988455716587E-08
-
-X( 1) = (  2.60554079560462E+06,  1.63729354647301E+07)
-X( 2) = (  7.33911049540213E-02,  8.26123847498778E-02)
-X( 3) = (  1.13354821553115E+07,  1.86827413905797E+07)
-X( 4) = (  1.01799474604476E+00, -7.23432130291105E-02)
-
-X( 5) = ( -1.04590719570926E-08,  1.58038405838508E-08)
-
-PATH NUMBER =      1608
-
-ARCLEN =  1.87236975389134E+00
-NFE =  273
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.37392367232130E-05
-
-X( 1) = ( -1.26951692398033E+05,  1.95201450810024E+05)
-X( 2) = (  5.41966261620013E-01, -3.05621211416147E-01)
-X( 3) = ( -3.50336022450362E+04,  1.27914200028180E+05)
-X( 4) = (  1.00364357753954E+00,  3.54848447664474E-02)
-
-X( 5) = (  3.61088112118966E-07,  1.95954302948623E-06)
-
-PATH NUMBER =      1609
-
-ARCLEN =  4.72149736005537E+00
-NFE =  327
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999382E-01
-
-X( 1) = (  1.94340984805461E+01, -3.92228748791729E+01)
-X( 2) = (  1.04983528626883E-01, -2.52125571854164E-01)
-X( 3) = ( -2.08070899190737E+01,  5.02236557643504E+01)
-X( 4) = (  8.78531359170156E-01,  6.97194391722149E-02)
-
-X( 5) = (  3.63202678884996E-02,  1.63527708707704E-02)
-
-PATH NUMBER =      1610
-
-ARCLEN =  1.67765836774195E+00
-NFE =  145
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.40590251756776E-08
-
-X( 1) = ( -1.78278756507627E+07, -1.02032207606709E+08)
-X( 2) = ( -8.70331854021260E-01, -1.21374374829572E-01)
-X( 3) = ( -8.87307235646229E+07,  1.30032225902503E+08)
-X( 4) = (  7.24328998854721E-01, -5.74538043735261E-02)
-
-X( 5) = (  4.66294312542618E-09,  1.59043501486060E-09)
-
-PATH NUMBER =      1611
-
-ARCLEN =  4.36283231415866E+00
-NFE =  429
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999909602369E-01
-
-X( 1) = (  6.22604587309947E+00, -3.92394477410637E+00)
-X( 2) = (  5.38768594338831E+00, -1.10292184918288E+01)
-X( 3) = (  2.27727179553409E-02,  2.53508100543895E-02)
-X( 4) = (  1.02202353100157E+00,  4.32227140376303E-02)
-
-X( 5) = ( -3.46198082030102E-02, -2.66447448966195E-02)
-
-PATH NUMBER =      1612
-
-ARCLEN =  3.76607209579111E+00
-NFE =  430
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98102012520940E-01
-
-X( 1) = (  1.97370391443259E-01, -2.39162033973803E-01)
-X( 2) = (  1.35443081353421E+00, -3.94983662868972E-01)
-X( 3) = ( -1.03713666408757E+00,  7.71733895149286E-01)
-X( 4) = (  5.34510564578114E-01,  1.42436569850765E-01)
-
-X( 5) = (  6.17027972730660E-02,  5.06876466967903E-01)
-
-PATH NUMBER =      1613
-
-ARCLEN =  2.53080553449559E+00
-NFE =  326
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99899732736972E-01
-
-X( 1) = (  8.57099406155153E-01, -7.75249752252630E-02)
-X( 2) = (  2.49479444233174E-01, -1.12973084672915E-01)
-X( 3) = (  1.60109427361676E-01,  6.80058385091565E-01)
-X( 4) = (  4.82692352010758E-01, -5.26264099114586E-01)
-
-X( 5) = ( -3.72142323455506E-01,  5.91045840432325E-01)
-
-PATH NUMBER =      1614
-
-ARCLEN =  1.50290595213902E+00
-NFE =  361
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99967837899425E-01
-
-X( 1) = (  2.07449600229212E-01,  2.21212453452588E-01)
-X( 2) = (  4.79605224148786E-01, -2.58358174974089E-01)
-X( 3) = ( -1.19483672656850E-01,  1.25057516763261E+00)
-X( 4) = (  1.24808033490184E+00,  2.36937784436133E-01)
-
-X( 5) = ( -5.92285343380538E-02,  4.52081383762191E-01)
-
-PATH NUMBER =      1615
-
-ARCLEN =  1.52967862955374E+00
-NFE =  227
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999818798E-01
-
-X( 1) = ( -2.09906761200540E-01,  1.69956979057268E-01)
-X( 2) = (  5.02994637609466E-01, -3.50105060149738E-01)
-X( 3) = ( -1.68877967566204E+00,  7.47337031518178E+00)
-X( 4) = (  8.65004713235833E-01,  1.32082323141266E-01)
-
-X( 5) = (  1.46883222029673E-02,  8.73119607566234E-02)
-
-PATH NUMBER =      1616
-
-ARCLEN =  1.93182125972749E+00
-NFE =  231
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.34172732490906E-12
-
-X( 1) = ( -1.19216919264393E+09,  9.90401456396536E+09)
-X( 2) = (  4.92137072559397E-01,  2.98467107115744E-01)
-X( 3) = (  2.59698535236087E+10,  4.80232387477685E+09)
-X( 4) = (  6.87009574320720E+09, -1.37070513921419E+10)
-
-X( 5) = ( -2.42225605892599E-11,  1.42025973772462E-11)
-
-PATH NUMBER =      1617
-
-ARCLEN =  3.36060632186103E+00
-NFE =  325
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.81175823480376E-06
-
-X( 1) = (  1.34007278321533E+00,  1.04480369129977E+00)
-X( 2) = (  6.14999612563708E-02, -3.58722874358849E-02)
-X( 3) = (  1.49856053589979E+06,  6.96743096800090E+05)
-X( 4) = (  9.23319731117915E-01, -1.47466063867045E-01)
-
-X( 5) = ( -4.08453926038061E-07,  1.66655945056204E-07)
-
-PATH NUMBER =      1618
-
-ARCLEN =  3.02152238603644E+00
-NFE =  256
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.29727180600662E-13
-
-X( 1) = (  4.24379648270604E+12,  2.51789581656541E+11)
-X( 2) = ( -3.01802495676649E+11,  9.79810546983898E+12)
-X( 3) = ( -2.66946656987585E+11, -1.05543548548152E+13)
-X( 4) = (  5.03956190954693E-01,  2.37828111964129E-04)
-
-X( 5) = (  4.45579716786687E-14, -1.09332139695828E-13)
-
-PATH NUMBER =      1619
-
-ARCLEN =  2.40586162271869E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999870890E-01
-
-X( 1) = (  3.93627036973069E-02, -7.00947409233769E-03)
-X( 2) = (  4.13734612950042E-01, -2.66426905968506E-01)
-X( 3) = ( -1.47967022078030E+00,  7.27530370092093E+00)
-X( 4) = (  9.74532577710661E-01,  6.02684044829889E-03)
-
-X( 5) = (  1.44601398106603E-02,  9.32120610787702E-02)
-
-PATH NUMBER =      1620
-
-ARCLEN =  3.17757447647952E+00
-NFE =  308
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97581985561467E-01
-
-X( 1) = ( -2.99418168819088E-01, -2.11957094552260E-01)
-X( 2) = (  9.53561491623988E-01, -3.30889455601673E-01)
-X( 3) = ( -1.28486951256820E+00, -5.65069248111879E-02)
-X( 4) = (  6.35773706129556E-01,  6.68703945131508E-02)
-
-X( 5) = (  4.65519716843398E-01,  2.32762813776382E-01)
-
-PATH NUMBER =      1621
-
-ARCLEN =  3.41572211203480E+00
-NFE =  359
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98234238444803E-01
-
-X( 1) = (  8.85644873583742E-01, -3.05742994020150E-01)
-X( 2) = (  5.63739075785691E-01, -4.72332134404082E-01)
-X( 3) = ( -1.19642590215461E+00,  2.94817202146631E-01)
-X( 4) = (  3.18933158639119E-01, -1.54885096289222E-01)
-
-X( 5) = (  1.34929615108812E+00,  1.19417264116004E+00)
-
-PATH NUMBER =      1622
-
-ARCLEN =  4.50751491970984E+00
-NFE =  382
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.88963175708205E-01
-
-X( 1) = (  2.84807247709403E-01, -2.03264582325066E-01)
-X( 2) = (  1.03108931563530E+00, -5.38317886250704E-01)
-X( 3) = ( -7.21369867069870E-01,  4.11023216786062E-01)
-X( 4) = (  5.59116706324270E-01,  5.90720691856285E-03)
-
-X( 5) = ( -3.23341874773623E-02,  9.27102322861964E-01)
-
-PATH NUMBER =      1623
-
-ARCLEN =  2.41382686776270E+00
-NFE =  330
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90450287128906E-01
-
-X( 1) = (  5.14447701590838E-01, -5.94875925971971E-02)
-X( 2) = (  8.21581547830255E-01, -2.65973069515813E-01)
-X( 3) = ( -6.44739314203920E-01,  2.19725994743599E-01)
-X( 4) = (  2.30128432888991E-01,  2.94017641964676E-01)
-
-X( 5) = ( -2.83454497530331E-01,  8.57574926297028E-01)
-
-PATH NUMBER =      1624
-
-ARCLEN =  2.29667305549683E+00
-NFE =  256
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.34898432290378E-07
-
-X( 1) = (  2.08996080632416E+06,  9.56956843284206E+05)
-X( 2) = (  4.55956057240109E-01,  1.23730030990164E-01)
-X( 3) = (  3.47110985187527E+05,  2.03852655287955E+06)
-X( 4) = (  7.29977636996089E-01, -7.42047799771809E-01)
-
-X( 5) = ( -1.70360716195811E-07,  1.27175044303427E-07)
-
-PATH NUMBER =      1625
-
-ARCLEN =  1.70682827462120E+00
-NFE =  318
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999990216750E-01
-
-X( 1) = (  4.64612454950751E-01,  3.06150428483216E-01)
-X( 2) = (  4.63918439043593E-01, -4.21489744545078E-01)
-X( 3) = (  1.23029932560215E-01,  5.62270507513747E+00)
-X( 4) = (  1.66488326726496E+00,  1.82100917671752E+00)
-
-X( 5) = ( -3.65958311704657E-02,  1.26289481012401E-01)
-
-PATH NUMBER =      1626
-
-ARCLEN =  1.96532880520555E+00
-NFE =  309
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999633598004E-01
-
-X( 1) = (  5.03866658295247E-01,  1.55327850082138E-01)
-X( 2) = ( -5.71502778314974E-01, -1.31941686224241E-02)
-X( 3) = (  2.65842639757111E+00,  1.54568582660899E+00)
-X( 4) = (  7.75954988009366E-01, -7.15176955866951E-02)
-
-X( 5) = ( -2.27354057444619E-01,  1.33236912548924E-01)
-
-PATH NUMBER =      1627
-
-ARCLEN =  1.52881141954773E+00
-NFE =  362
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999997565622E-01
-
-X( 1) = ( -5.09774361556835E+00, -2.50325295459383E+00)
-X( 2) = (  5.33382544788741E-01, -4.87069761833049E-01)
-X( 3) = ( -8.75577341071534E+00,  7.21087823489268E+00)
-X( 4) = (  5.32529364147284E-01,  1.91795771939970E-01)
-
-X( 5) = (  4.00943287675207E-02,  2.25339898322228E-02)
-
-PATH NUMBER =      1628
-
-ARCLEN =  6.91675741720751E+00
-NFE =  289
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.35092598078382E-07
-
-X( 1) = (  6.40298481195147E+05, -8.56293622924224E+07)
-X( 2) = (  1.91593511273110E+08,  2.60537758089870E+07)
-X( 3) = ( -3.76439593250358E+00, -1.66500809632734E+00)
-X( 4) = (  6.51555107686351E-01,  8.32782097525351E-02)
-
-X( 5) = ( -7.15770453839490E-09,  3.95096597685619E-09)
-
-PATH NUMBER =      1629
-
-ARCLEN =  2.30063810604873E+00
-NFE =  263
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.86243549846507E-01
-
-X( 1) = (  2.85332244911181E-01, -4.76237163333196E-01)
-X( 2) = (  1.02381406084139E+00, -7.69923014467154E-01)
-X( 3) = ( -1.40942811801815E+00,  4.96570764601053E-01)
-X( 4) = (  5.53463658801936E-01,  1.15353288611739E-01)
-
-X( 5) = (  7.44193474720406E-01,  5.91615927413972E-01)
-
-PATH NUMBER =      1630
-
-ARCLEN =  2.73544144293175E+00
-NFE =  364
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98363060349169E-01
-
-X( 1) = (  5.94271857940821E-01,  9.41992596644220E-02)
-X( 2) = (  9.54660396695254E-01, -8.59306807556502E-01)
-X( 3) = ( -1.20294203031423E+00,  3.58182921632357E-01)
-X( 4) = (  3.22970363018676E-01, -4.43942101169364E-01)
-
-X( 5) = (  5.89148378673254E-02,  8.74465806156354E-01)
-
-PATH NUMBER =      1631
-
-ARCLEN =  1.53709512101997E+00
-NFE =  337
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99253966547123E-01
-
-X( 1) = (  5.84288196410059E-01,  2.01307633414935E-01)
-X( 2) = (  1.30884343108729E+00, -1.03863967508040E+00)
-X( 3) = ( -6.60047188873905E-01,  9.10279519860640E-01)
-X( 4) = (  3.59507409273113E-01, -3.43252449150332E-01)
-
-X( 5) = ( -2.15809141386911E-01,  3.55256665294559E-01)
-
-PATH NUMBER =      1632
-
-ARCLEN =  1.32301775641229E+00
-NFE =  343
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97447125408194E-01
-
-X( 1) = (  3.25434239864551E-01,  4.29633013712187E-01)
-X( 2) = (  9.27844568060276E-01,  4.57076226215008E-02)
-X( 3) = ( -7.06154181134441E-01,  2.17932219592993E-01)
-X( 4) = (  1.68634395565011E-01, -1.31873472078012E-02)
-
-X( 5) = ( -2.34449031207842E-03,  4.44411193772810E-01)
-
-PATH NUMBER =      1633
-
-ARCLEN =  1.84483616781109E+00
-NFE =  295
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99992878616242E-01
-
-X( 1) = (  1.37772278182493E+00,  1.64946928819531E+00)
-X( 2) = (  9.56767138327374E-01,  1.10562904874185E-01)
-X( 3) = ( -3.30993903147879E-02,  9.27144348626012E-02)
-X( 4) = (  2.20439037409302E-03, -4.28114338572895E-01)
-
-X( 5) = ( -1.50658392298156E-01,  1.80401269233182E-01)
-
-PATH NUMBER =      1634
-
-ARCLEN =  1.42434838491252E+00
-NFE =  317
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999567452295E-01
-
-X( 1) = ( -3.35340102060737E+00,  1.95357818950523E+00)
-X( 2) = (  1.12289498362372E+00, -7.00475806847069E-02)
-X( 3) = ( -1.83932698625821E+00,  3.53691153595385E+00)
-X( 4) = (  5.13983520880441E-02, -1.71025700612253E-02)
-
-X( 5) = (  3.37096426232527E-02,  7.66086960202095E-02)
-
-PATH NUMBER =      1635
-
-ARCLEN =  1.40524412392184E+00
-NFE =  317
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99985992867235E-01
-
-X( 1) = ( -1.65210198945872E+00, -1.18715911740070E+00)
-X( 2) = (  1.06709684362871E+00,  2.89409383978901E-02)
-X( 3) = ( -3.13487367401469E+00,  1.02766369422363E-01)
-X( 4) = (  1.36745905391028E-03, -2.99454858392724E-03)
-
-X( 5) = (  1.45763770040731E-01,  3.33449534794446E-02)
-
-PATH NUMBER =      1636
-
-ARCLEN =  1.83722177858960E+00
-NFE =  127
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.65349039556168E-13
-
-X( 1) = (  2.92334838501546E+11,  2.37752590045094E+12)
-X( 2) = ( -4.27921013071156E+12,  2.79842962330168E+12)
-X( 3) = (  7.65247503352914E+12,  6.78265717986732E+11)
-X( 4) = (  5.00706540883265E-01,  1.28910342981091E-02)
-
-X( 5) = ( -1.36736271177246E-13,  5.64753864333578E-14)
-
-PATH NUMBER =      1637
-
-ARCLEN =  2.39151340722413E+00
-NFE =  252
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98371422076397E-01
-
-X( 1) = (  4.75355188644040E-01,  4.73948300653289E-01)
-X( 2) = (  8.79405600994133E-01, -2.41477994943128E-01)
-X( 3) = ( -6.45044585318056E-01, -2.26466891414200E-02)
-X( 4) = (  2.84791090125844E-01, -1.14255687587677E-01)
-
-X( 5) = ( -1.47477931526057E-01,  6.05954381358457E-01)
-
-PATH NUMBER =      1638
-
-ARCLEN =  3.16839842082659E+00
-NFE =  117
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.06737031730702E-14
-
-X( 1) = (  4.91847727624859E-01,  1.35451599480646E-02)
-X( 2) = ( -3.25345069318400E+14,  2.40096489260445E+14)
-X( 3) = (  3.33815981870368E+14, -1.26675041608120E+14)
-X( 4) = ( -9.96834096170302E+13,  1.83283722624355E+14)
-
-X( 5) = ( -1.73117271386192E-15, -3.79497865424239E-15)
-
-PATH NUMBER =      1639
-
-ARCLEN =  1.57368211969449E+00
-NFE =  255
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94267019255519E-01
-
-X( 1) = (  6.12476460819185E-01,  3.47701733026236E-02)
-X( 2) = (  9.52485886039115E-01, -4.08747307746773E-01)
-X( 3) = ( -8.51479978403159E-01,  1.02753462134198E-01)
-X( 4) = ( -2.54797621987312E-02, -4.09372211711794E-01)
-
-X( 5) = ( -9.29887972662965E-02,  7.80429319547620E-01)
-
-PATH NUMBER =      1640
-
-ARCLEN =  1.62433363702329E+00
-NFE =  426
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98298672874008E-01
-
-X( 1) = (  5.47506639491343E-01,  1.37747854251752E-01)
-X( 2) = (  1.61454788105351E+00, -7.57834806422723E-01)
-X( 3) = ( -1.12116504922694E+00,  2.09014986078932E-01)
-X( 4) = (  3.65016587453583E-01, -3.05923815037298E-01)
-
-X( 5) = ( -2.13516009808022E-01,  5.71132276707750E-01)
-
-PATH NUMBER =      1641
-
-ARCLEN =  1.34974292225048E+00
-NFE =  398
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98875250318154E-01
-
-X( 1) = (  3.36667379095761E-01,  8.00404305722104E-01)
-X( 2) = (  1.00126517963501E+00,  6.22148914054694E-02)
-X( 3) = ( -5.31318488644782E-02, -2.49690878643631E-02)
-X( 4) = (  8.47287416468966E-02, -2.94154204476810E-01)
-
-X( 5) = ( -1.39181375706094E-01,  3.38869897371930E-01)
-
-PATH NUMBER =      1642
-
-ARCLEN =  1.61122799770872E+00
-NFE =  410
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999948215388E-01
-
-X( 1) = ( -8.54316302851441E-01,  2.68839863300321E+00)
-X( 2) = (  9.55263461549120E-01, -1.12284721846843E-02)
-X( 3) = (  6.53868537250547E-03,  1.45044653485786E-01)
-X( 4) = (  1.08700494971803E-01, -1.12541249827785E-01)
-
-X( 5) = ( -2.42821222520413E-02,  1.74317528689581E-01)
-
-PATH NUMBER =      1643
-
-ARCLEN =  1.39344464590969E+00
-NFE =  187
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.23711926197972E-12
-
-X( 1) = ( -1.94835605463078E+10, -1.40481097096303E+11)
-X( 2) = (  5.73283559105722E-01, -4.05545155540661E-01)
-X( 3) = ( -9.21002820144716E+10, -5.60078753937315E+10)
-X( 4) = (  3.93859527543071E+10,  6.45233699500277E+10)
-
-X( 5) = (  1.75063316707608E-12, -2.30933750854784E-12)
-
-PATH NUMBER =      1644
-
-ARCLEN =  1.47579617770996E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999992174350E-01
-
-X( 1) = ( -3.51213737441824E+00,  3.70468075844533E+00)
-X( 2) = (  5.19119922873029E-01, -4.53907621795378E-01)
-X( 3) = ( -2.45710221727389E+00,  6.40336075179806E+00)
-X( 4) = (  5.40069741567220E-01,  2.38742670758869E-01)
-
-X( 5) = (  1.75215475368197E-02,  5.68475078163061E-02)
-
-PATH NUMBER =      1645
-
-ARCLEN =  1.98705733384097E+00
-NFE =  150
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.34731967434217E-14
-
-X( 1) = ( -6.63130376875481E+12,  1.08283143198211E+12)
-X( 2) = (  2.77077603483793E+11, -1.35025648073948E+13)
-X( 3) = ( -3.20156253939406E+12,  1.92356748141639E+13)
-X( 4) = (  4.93803897285709E-01,  4.70221379775163E-03)
-
-X( 5) = (  1.28664982314286E-15,  5.09896487012329E-14)
-
-PATH NUMBER =      1646
-
-ARCLEN =  2.80260424633410E+00
-NFE =  385
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995768166822E-01
-
-X( 1) = (  6.69660441677933E-01,  1.29749512878944E+00)
-X( 2) = (  6.89157241938895E-01, -7.57279681583672E-01)
-X( 3) = ( -3.78272906459307E-01,  4.44911698908292E-02)
-X( 4) = (  9.82258979564576E-01, -6.03353223945845E-02)
-
-X( 5) = ( -3.19437590493402E-01,  3.31697058462060E-01)
-
-PATH NUMBER =      1647
-
-ARCLEN =  2.80653167937179E+00
-NFE =  533
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998767404904E-01
-
-X( 1) = (  6.16392350599876E-01,  2.24049115267264E-01)
-X( 2) = (  5.70618006508731E-01, -4.56785989846009E-01)
-X( 3) = ( -7.82823967804040E-01,  1.28150882763252E+00)
-X( 4) = ( -2.07497855719931E+00, -2.19557178848284E+00)
-
-X( 5) = (  1.47339996316597E-02,  2.28632532883299E-01)
-
-PATH NUMBER =      1648
-
-ARCLEN =  1.78214981330911E+00
-NFE =  423
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98683756850512E-01
-
-X( 1) = (  7.19423564113903E-01,  1.10472396821898E-01)
-X( 2) = (  7.22369188034343E-01, -4.24774477427353E-01)
-X( 3) = ( -4.78102184220268E-01,  1.76881350733295E-01)
-X( 4) = ( -6.42428590558131E-01, -8.23078731646386E-01)
-
-X( 5) = ( -1.96843332622752E-01,  5.41872371028651E-01)
-
-PATH NUMBER =      1649
-
-ARCLEN =  1.30072743892415E+00
-NFE =  207
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96336254106320E-01
-
-X( 1) = (  7.31508843168733E-02,  5.73992269704600E-01)
-X( 2) = (  1.03002090071910E+00,  3.66203082984156E-02)
-X( 3) = ( -1.38304674779864E-01, -8.69316726823856E-02)
-X( 4) = (  3.92398586079495E-01, -5.67003334670030E-01)
-
-X( 5) = ( -5.53800419566353E-02,  4.44652849988664E-01)
-
-PATH NUMBER =      1650
-
-ARCLEN =  1.15434944978270E+00
-NFE =  291
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99326339280943E-01
-
-X( 1) = ( -2.73454123753790E-01,  8.76126187995016E-01)
-X( 2) = (  8.82697856749496E-01,  2.12381238807805E-01)
-X( 3) = ( -3.43119952408924E-03,  2.23644654389885E-01)
-X( 4) = (  5.28184075440942E-01, -5.26660294452768E-01)
-
-X( 5) = (  6.69901736432797E-03,  3.15424253421698E-01)
-
-PATH NUMBER =      1651
-
-ARCLEN =  1.27420748441706E+00
-NFE =  336
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98095456554752E-01
-
-X( 1) = ( -3.40445390660531E-01,  4.48957400243666E-01)
-X( 2) = (  8.99153440091369E-01,  2.09194014218044E-03)
-X( 3) = ( -2.20378957273362E-01,  2.28810850574083E-01)
-X( 4) = (  4.11084319143142E-01, -4.06907196896304E-01)
-
-X( 5) = (  6.29033929396430E-02,  3.82982415591736E-01)
-
-PATH NUMBER =      1652
-
-ARCLEN =  2.09866868220058E+00
-NFE =  444
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999995900E-01
-
-X( 1) = (  2.73112953518211E+01,  2.14010621588163E+01)
-X( 2) = (  9.55065037262951E-01,  4.21600020916447E-02)
-X( 3) = (  1.36256435490376E+01,  9.40193761062076E+00)
-X( 4) = ( -1.24976730851109E-02, -7.02954399515192E-03)
-
-X( 5) = ( -1.32086927933628E-02,  5.09104172669309E-03)
-
-PATH NUMBER =      1653
-
-ARCLEN =  1.41250003316740E+00
-NFE =  141
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.71429158864002E-11
-
-X( 1) = (  1.73044248358376E+10,  5.28458511302007E+10)
-X( 2) = (  5.29623910254922E-01, -5.49779117617872E-01)
-X( 3) = (  4.22020158027314E+10,  2.56663202855056E+10)
-X( 4) = ( -3.81157247227721E+10, -6.25861694685609E+09)
-
-X( 5) = ( -4.48508900375080E-12,  4.24858352708959E-12)
-
-PATH NUMBER =      1654
-
-ARCLEN =  1.89300674169741E+00
-NFE =  256
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.37396496696359E-10
-
-X( 1) = (  7.81732337487620E+09,  5.14813282792259E+08)
-X( 2) = (  5.38977169173401E-01, -2.90669018506517E-01)
-X( 3) = (  2.62118604144910E+09, -3.98899986150408E+09)
-X( 4) = ( -6.08861526396496E+09, -1.12958890836137E+09)
-
-X( 5) = ( -5.95831697782628E-11, -2.37447556191914E-11)
-
-PATH NUMBER =      1655
-
-ARCLEN =  1.88059201517417E+00
-NFE =  186
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.12501571653899E-09
-
-X( 1) = (  3.13697132349575E+08,  6.36787743483229E+08)
-X( 2) = (  5.19280258281372E-01, -3.39854865448442E-01)
-X( 3) = (  4.34308910088247E+08,  6.22290225952170E+08)
-X( 4) = ( -1.39063885823563E+09,  6.42711500709309E+07)
-
-X( 5) = ( -2.25428840877487E-10,  2.73779988588761E-10)
-
-PATH NUMBER =      1656
-
-ARCLEN =  5.67250159224393E+00
-NFE =  212
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.13926370863802E-10
-
-X( 1) = (  9.31250952281295E-02, -5.62485746377381E-03)
-X( 2) = ( -5.00756074074158E+09,  6.00548100438649E+09)
-X( 3) = (  5.06422988067650E+09, -7.58862866853501E+09)
-X( 4) = (  9.18333628490042E-01, -1.25597207354269E-03)
-
-X( 5) = (  2.92406521630421E-11, -1.02135822802746E-10)
-
-PATH NUMBER =      1657
-
-ARCLEN =  1.77429390402629E+00
-NFE =  233
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97237724210656E-01
-
-X( 1) = ( -1.52923172215563E-01, -3.93765767042748E-02)
-X( 2) = (  1.18905654153289E+00,  5.06258562668433E-03)
-X( 3) = ( -3.63656599233898E-01, -2.32157329642296E-01)
-X( 4) = (  8.20165412666641E-01, -4.24567946530957E-01)
-
-X( 5) = (  3.07892230516629E-01,  6.90443711765787E-01)
-
-PATH NUMBER =      1658
-
-ARCLEN =  1.12270213186110E+00
-NFE =  289
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96092877993530E-01
-
-X( 1) = ( -1.03255558759655E-01,  7.43018220885392E-02)
-X( 2) = (  9.46120536866114E-01,  4.89319233475071E-02)
-X( 3) = ( -5.22226236587661E-01,  5.50190156112248E-01)
-X( 4) = (  4.98771279942838E-01, -7.21858973697240E-01)
-
-X( 5) = (  1.26577245365775E-01,  3.52091269780326E-01)
-
-PATH NUMBER =      1659
-
-ARCLEN =  2.30893567618768E+00
-NFE =  289
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.16308136380267E-08
-
-X( 1) = ( -3.84631808006099E+06, -4.53597389495539E+06)
-X( 2) = (  9.55558771941172E-02, -2.53319381760117E-01)
-X( 3) = (  8.56579053817740E-01,  3.52327700362828E-02)
-X( 4) = (  3.82427055360186E+06,  4.30761965871395E+06)
-
-X( 5) = (  7.34004952654616E-08, -8.17219778799071E-08)
-
-PATH NUMBER =      1660
-
-ARCLEN =  1.25653142565977E+00
-NFE =  257
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99008723497232E-01
-
-X( 1) = ( -6.02954163990922E-01,  1.23732963289253E+00)
-X( 2) = (  5.16703760090512E-01,  5.61999507642527E-01)
-X( 3) = (  5.95801460841121E-01,  4.01402431863894E-01)
-X( 4) = (  5.77353692487895E-01, -6.76815626443198E-01)
-
-X( 5) = (  8.16942605216202E-03,  2.45638574389528E-01)
-
-PATH NUMBER =      1661
-
-ARCLEN =  1.26246418379688E+00
-NFE =  306
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99021076817749E-01
-
-X( 1) = ( -3.59577502224129E-01,  3.18069828184051E-01)
-X( 2) = (  7.51270547207614E-01,  1.41220487938346E-01)
-X( 3) = ( -6.28220263733837E-01,  7.50491099316376E-01)
-X( 4) = (  6.15556234257115E-01, -5.51965199961726E-01)
-
-X( 5) = (  1.23198080618727E-01,  2.68754316083186E-01)
-
-PATH NUMBER =      1662
-
-ARCLEN =  1.82324583661089E+00
-NFE =  285
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.22096847878391E-07
-
-X( 1) = (  2.69355669025210E+06, -1.34309143642447E+06)
-X( 2) = (  1.08405407500872E+00,  9.65855219420883E-02)
-X( 3) = (  2.39406242392726E+06, -1.27770710864791E+06)
-X( 4) = ( -7.00977622577792E-02,  7.85379062291527E-03)
-
-X( 5) = ( -9.72777528572360E-08, -8.48356540332973E-08)
-
-PATH NUMBER =      1663
-
-ARCLEN =  1.59912755934626E+00
-NFE =  289
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99701645308100E-01
-
-X( 1) = ( -5.70620612676731E-01,  3.49628139766535E-01)
-X( 2) = (  7.35002476473706E-01,  2.08118250992855E-02)
-X( 3) = ( -9.61581968995384E-02, -2.09263350861682E-02)
-X( 4) = (  1.06288562138814E+00, -5.15388571984397E-01)
-
-X( 5) = (  2.42530853654523E-01,  4.27404461597262E-01)
-
-PATH NUMBER =      1664
-
-ARCLEN =  1.69254242321981E+00
-NFE =  194
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.83793874908894E-12
-
-X( 1) = ( -2.89827724374955E+08, -1.39743717842206E+09)
-X( 2) = (  4.99413723077588E-01, -2.84194424716475E-01)
-X( 3) = ( -2.49970307517506E+09, -2.56551740741770E+08)
-X( 4) = (  2.89456581747426E+09,  2.00999566745203E+08)
-
-X( 5) = (  1.34503835966162E-10, -8.66778230136991E-11)
-
-PATH NUMBER =      1665
-
-ARCLEN =  1.39062122679369E+00
-NFE =  387
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98681774995799E-01
-
-X( 1) = ( -2.09915344148131E-02,  2.68563267682123E-02)
-X( 2) = (  1.02307402801782E+00, -3.88009549238639E-02)
-X( 3) = ( -7.74516564107219E-01,  1.79606126502243E-01)
-X( 4) = (  3.81076848419739E-01, -1.19154184549468E+00)
-
-X( 5) = (  2.13749830199998E-01,  3.48112654833403E-01)
-
-PATH NUMBER =      1666
-
-ARCLEN =  1.55143147855394E+00
-NFE =  198
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.13916887663718E-11
-
-X( 1) = (  2.37957644656475E+10, -9.78375657335290E+09)
-X( 2) = (  4.92706808091559E-01,  2.88189991290968E-01)
-X( 3) = (  2.43309834667883E+09, -3.04157218155509E+10)
-X( 4) = ( -3.01003764570779E+10,  8.68529403739804E+09)
-
-X( 5) = ( -8.84562865663407E-12, -1.22898766901150E-11)
-
-PATH NUMBER =      1667
-
-ARCLEN =  3.72059950384381E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99299362251787E-01
-
-X( 1) = ( -3.02106599734729E-01, -5.54940159728802E-01)
-X( 2) = (  1.19176897910957E+00, -3.03790456411102E-01)
-X( 3) = ( -1.57844904609810E-01,  9.97910206723844E-02)
-X( 4) = (  1.30546783268421E+00, -1.52586420379216E-01)
-
-X( 5) = (  1.05476006152860E+00,  1.08623595023866E+00)
-
-PATH NUMBER =      1668
-
-ARCLEN =  2.20756570324438E+00
-NFE =  327
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99001502080282E-01
-
-X( 1) = ( -5.61497863452526E-01, -7.21684782313367E-01)
-X( 2) = (  9.63789507535866E-01, -4.93403580950322E-03)
-X( 3) = ( -5.80339785198013E-01,  2.56532350369397E-01)
-X( 4) = (  1.54414046025598E+00,  6.21350252016996E-01)
-
-X( 5) = (  6.09472710852118E-01,  1.65205345486839E-01)
-
-PATH NUMBER =      1669
-
-ARCLEN =  3.24001086897291E+00
-NFE =  270
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999991E-01
-
-X( 1) = ( -1.68521972834753E+02,  2.32733572804957E+01)
-X( 2) = (  4.31928941869219E-02,  2.27211486600821E-01)
-X( 3) = (  9.82795719255521E-01, -3.40965832007761E-02)
-X( 4) = (  2.40052158950940E+02,  1.03142289610086E+02)
-
-X( 5) = (  4.70080682398743E-03, -7.27896201385602E-04)
-
-PATH NUMBER =      1670
-
-ARCLEN =  1.74597546584531E+00
-NFE =  455
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991352951043E-01
-
-X( 1) = ( -9.29638580909937E-01,  1.12013301355077E+00)
-X( 2) = (  4.96846599671595E-01, -3.57028500741252E-01)
-X( 3) = ( -1.28759389556640E-01,  8.43482906114304E-01)
-X( 4) = (  7.74921343423160E-01,  2.63767431574851E-01)
-
-X( 5) = (  3.55203214972269E-02,  2.77241655621576E-01)
-
-PATH NUMBER =      1671
-
-ARCLEN =  1.95571868725458E+00
-NFE =  278
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999960E-01
-
-X( 1) = ( -1.54281127219102E+02, -3.29514469282995E+01)
-X( 2) = ( -8.22430701429914E-02,  5.74479539255683E-02)
-X( 3) = (  8.20848122543560E+01,  1.27309277741505E+02)
-X( 4) = (  9.96854465731852E-01,  2.24688668764590E-03)
-
-X( 5) = (  1.70575201754843E-03,  3.94422938216865E-03)
-
-PATH NUMBER =      1672
-
-ARCLEN =  2.19881013545457E+00
-NFE =  313
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999804284392E-01
-
-X( 1) = (  1.77429156593112E+00,  1.57030880916908E+00)
-X( 2) = (  7.62095928914460E-02, -1.28801144202526E-01)
-X( 3) = (  3.21180723380975E-01,  7.45306242888972E-01)
-X( 4) = (  9.47620288187290E-01, -3.02697050585953E-02)
-
-X( 5) = ( -2.07144435862698E-01,  1.58045035386302E-01)
-
-PATH NUMBER =      1673
-
-ARCLEN =  1.28706013546630E+00
-NFE =  129
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.29528588043992E-12
-
-X( 1) = ( -5.69436224592416E+10, -2.39387723951271E+09)
-X( 2) = (  5.04956084665585E-01, -2.89783969832560E-01)
-X( 3) = (  6.30068776538754E+09,  9.83135938868147E+10)
-X( 4) = (  5.50218958565458E+09, -6.60889376823243E+10)
-
-X( 5) = (  2.33484222624328E-12,  4.38299548564947E-12)
-
-PATH NUMBER =      1674
-
-ARCLEN =  1.87918541802022E+00
-NFE =  201
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999996516E-01
-
-X( 1) = ( -6.32769992213542E-02, -7.66652580590039E-03)
-X( 2) = (  1.11268353014616E+00, -7.97739568156083E-03)
-X( 3) = (  3.49493799435302E+00,  3.82501480902456E+01)
-X( 4) = ( -2.23457670226747E+01, -5.14117059208751E+01)
-
-X( 5) = (  2.09089182731957E-03,  1.21892773691750E-02)
-
-PATH NUMBER =      1675
-
-ARCLEN =  3.98939334712994E+00
-NFE =  485
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99980432058180E-01
-
-X( 1) = ( -7.68291676411933E-01, -7.22616391430767E-01)
-X( 2) = (  6.36735385335350E-01, -1.21028818873061E-01)
-X( 3) = ( -1.10028630798937E-01,  9.72499086005410E-01)
-X( 4) = (  2.41789874968108E+00,  1.45980060271449E+00)
-
-X( 5) = (  7.89219113140454E-01,  3.14222306551354E-01)
-
-PATH NUMBER =      1676
-
-ARCLEN =  2.42270326286385E+00
-NFE =  342
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98308051333548E-01
-
-X( 1) = ( -2.11047376744154E-01, -6.31115080392437E-01)
-X( 2) = (  1.09574969256873E+00,  5.88009858173316E-02)
-X( 3) = ( -4.71395153150440E-01,  2.88762996038384E-01)
-X( 4) = (  1.32913029095647E+00,  5.44156039128835E-01)
-
-X( 5) = (  7.41472286481008E-01,  6.16154833343242E-01)
-
-PATH NUMBER =      1677
-
-ARCLEN =  1.48782283125174E+00
-NFE =  430
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99370456858712E-01
-
-X( 1) = ( -1.88536008429951E-01, -1.25638072344129E-01)
-X( 2) = (  8.37809913647072E-01, -2.73323488120485E-01)
-X( 3) = ( -1.30635804592519E+00,  7.84050135109247E-01)
-X( 4) = (  6.48006127418305E-01,  4.47415426234885E-02)
-
-X( 5) = (  2.42484664284433E-01,  2.94173899129068E-01)
-
-PATH NUMBER =      1678
-
-ARCLEN =  1.69909954539248E+00
-NFE =  389
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99993976850515E-01
-
-X( 1) = ( -2.81698441029018E-01,  1.26320781242259E+00)
-X( 2) = (  5.33759302606975E-01,  3.67096880598174E-04)
-X( 3) = ( -1.21657401216969E+00,  8.02736316746297E-01)
-X( 4) = (  1.16092147531891E+00,  6.92320769237761E-01)
-
-X( 5) = (  8.93842645958259E-02,  2.62474016298632E-01)
-
-PATH NUMBER =      1679
-
-ARCLEN =  1.49035360935396E+00
-NFE =  211
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.09081125452293E-07
-
-X( 1) = (  5.01699601911597E+05,  2.93059836497519E+06)
-X( 2) = (  6.93529543786160E-02,  1.75884425550787E-01)
-X( 3) = (  1.67925530582940E+06,  3.19350490691300E+06)
-X( 4) = (  9.35848536129083E-01, -3.47642941814312E-02)
-
-X( 5) = ( -5.84226000463386E-08,  9.40214731870686E-08)
-
-PATH NUMBER =      1680
-
-ARCLEN =  1.42507688440302E+00
-NFE =  350
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98128459111517E-01
-
-X( 1) = ( -4.06016531664841E-01, -5.01601342467217E-02)
-X( 2) = (  6.60479744238512E-01,  3.27833197040966E-02)
-X( 3) = ( -4.68117693890273E-01,  5.23340680821008E-01)
-X( 4) = (  1.09241833786539E+00,  8.60879987243820E-02)
-
-X( 5) = (  2.76265769542819E-01,  3.78980272736798E-01)
-
-PATH NUMBER =      1681
-
-ARCLEN =  1.30636981075155E+00
-NFE =  182
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.99846439937586E-07
-
-X( 1) = (  9.65368477514946E+05,  1.82988750772186E+05)
-X( 2) = (  7.03647413913458E-03, -1.07578353534422E-01)
-X( 3) = (  1.28482946207970E+06, -1.63668002533675E+06)
-X( 4) = (  9.65717056425898E-01,  3.32418187204491E-02)
-
-X( 5) = ( -1.88579104026782E-07, -1.67197948290057E-07)
-
-PATH NUMBER =      1682
-
-ARCLEN =  1.24058475792200E+00
-NFE =  149
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.82616330884796E-12
-
-X( 1) = ( -7.38888306891616E+08, -3.16683419918935E+10)
-X( 2) = (  4.99220058887227E-01, -2.92570921745747E-01)
-X( 3) = ( -4.68043390195241E+10,  1.89468454166820E+10)
-X( 4) = (  1.84307200421296E+10,  1.67576026178898E+09)
-
-X( 5) = (  1.10536746856377E-11, -2.67712620734967E-12)
-
-PATH NUMBER =      1683
-
-ARCLEN =  6.99586205086629E+00
-NFE =  332
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.98475321210597E-08
-
-X( 1) = (  7.52479343441542E+07, -3.59032390548601E+06)
-X( 2) = ( -1.35939492824507E+07,  1.69559381261492E+08)
-X( 3) = ( -1.17119492996616E+00, -3.11631561022458E-02)
-X( 4) = (  6.14283935888120E-01,  1.71152542264167E-02)
-
-X( 5) = (  4.03572046584638E-09,  8.37137900661219E-09)
-
-PATH NUMBER =      1684
-
-ARCLEN =  2.86436505521375E+00
-NFE =  318
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.11380289949985E-06
-
-X( 1) = ( -5.08780138465252E-02,  5.76416890692360E-03)
-X( 2) = (  1.22142300422038E+00, -9.23548506272672E-02)
-X( 3) = ( -5.31014259696259E+05,  4.36480383235908E+03)
-X( 4) = (  1.64461302633407E+00,  9.19223110558544E-01)
-
-X( 5) = (  1.37072584907621E-06,  7.68853754058068E-08)
-
-PATH NUMBER =      1685
-
-ARCLEN =  1.25640839452530E+00
-NFE =  395
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97211748817441E-01
-
-X( 1) = (  1.17189220068742E-02, -1.68236960881251E-01)
-X( 2) = (  5.18663284361960E-01,  2.70641826513825E-02)
-X( 3) = ( -6.75255466648490E-01,  6.94371766723256E-01)
-X( 4) = (  1.08754411675750E+00, -4.85162979957094E-03)
-
-X( 5) = (  3.25798371118695E-01,  3.95720221325246E-01)
-
-PATH NUMBER =      1686
-
-ARCLEN =  1.36798362098654E+00
-NFE =  288
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99008016055793E-01
-
-X( 1) = ( -2.18581629976788E-02, -4.29489751170598E-02)
-X( 2) = (  6.77532098443162E-01,  3.49062582775780E-01)
-X( 3) = ( -4.73008578377012E-01,  8.77243027135904E-01)
-X( 4) = (  1.02685958478723E+00, -1.13041764287136E-02)
-
-X( 5) = (  1.52634837404927E-01,  3.57873397623710E-01)
-
-PATH NUMBER =      1687
-
-ARCLEN =  2.34784937065613E+00
-NFE =  239
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.64354553334360E-09
-
-X( 1) = (  5.02225331261690E+08,  4.87274473474648E+08)
-X( 2) = (  4.74237479568053E-01, -2.79448436698893E-01)
-X( 3) = (  9.73362750726902E+08,  5.04922991843448E+06)
-X( 4) = ( -7.63193447136583E+08, -1.23825464877360E+09)
-
-X( 5) = ( -4.23324012129023E-10,  2.42162706283033E-10)
-
-PATH NUMBER =      1688
-
-ARCLEN =  2.68439265684328E+00
-NFE =  344
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.59795368459135E-08
-
-X( 1) = (  1.01974409751217E-01,  6.19457508190046E-03)
-X( 2) = ( -4.26732484930659E+07,  5.91006777780824E+07)
-X( 3) = (  7.62691222871731E+07,  5.96062363231054E+07)
-X( 4) = (  9.06820968525114E-01, -8.31123415385460E-03)
-
-X( 5) = ( -2.47951541717801E-09,  9.54426394579426E-09)
-
-PATH NUMBER =      1689
-
-ARCLEN =  1.47071135353993E+00
-NFE =  193
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.04143409023268E-07
-
-X( 1) = ( -9.54154999657415E+06,  6.99604502432851E+06)
-X( 2) = (  3.33510573471098E-01, -5.28470889521153E-02)
-X( 3) = ( -8.15905969375470E+06,  1.32905096101126E+07)
-X( 4) = (  8.90341892786573E-01, -1.10894819147440E-01)
-
-X( 5) = (  1.29940674017167E-08,  2.31592585277348E-08)
-
-PATH NUMBER =      1690
-
-ARCLEN =  1.43403884344106E+00
-NFE =  218
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.50393768655476E-07
-
-X( 1) = (  3.94205245416996E+06,  1.38972362791955E+06)
-X( 2) = (  7.67505766273853E-02,  2.45945059059707E-01)
-X( 3) = (  1.13192212841623E+06, -8.47021445271914E+06)
-X( 4) = (  9.13110269240787E-01, -4.72251461123534E-02)
-
-X( 5) = ( -3.50091346035372E-08, -6.30846507733321E-08)
-
-PATH NUMBER =      1691
-
-ARCLEN =  2.30986800620310E+00
-NFE =  297
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999951144E-01
-
-X( 1) = ( -5.11685149978347E+00, -3.98338133270187E+01)
-X( 2) = ( -7.85211345848585E-02,  1.43059896933522E-01)
-X( 3) = ( -2.49377324873141E+01,  3.17082984985778E+01)
-X( 4) = (  1.01203914046662E+00,  1.97294001684045E-02)
-
-X( 5) = (  1.62436239801350E-02, -4.66968853638667E-04)
-
-PATH NUMBER =      1692
-
-ARCLEN =  3.78350194560669E+00
-NFE =  453
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99983904136746E-01
-
-X( 1) = ( -6.18304268001202E-01, -4.61909743490736E-01)
-X( 2) = (  8.91733758473222E-01, -8.59139024285843E-02)
-X( 3) = ( -1.08767529197929E+00,  4.20509117706182E-01)
-X( 4) = (  1.39362794617331E+00,  2.34021327610812E+00)
-
-X( 5) = (  7.06790598895536E-01,  3.10766355566186E-01)
-
-PATH NUMBER =      1693
-
-ARCLEN =  1.83721301438400E+00
-NFE =  298
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99743932992309E-01
-
-X( 1) = (  6.82919574369097E-01, -4.51534070475997E-01)
-X( 2) = (  3.17513345297931E-01, -1.75832983298918E-01)
-X( 3) = ( -1.37130581317267E+00,  4.70738012316812E-01)
-X( 4) = (  9.13211783221362E-01, -2.32483725066138E-01)
-
-X( 5) = (  5.89776732763427E-01,  1.22053118761539E-01)
-
-PATH NUMBER =      1694
-
-ARCLEN =  1.71529822084773E+00
-NFE =  284
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995583216202E-01
-
-X( 1) = ( -1.70614101646246E-02, -2.20412374628504E-02)
-X( 2) = (  1.06666697085166E+00, -6.73496345166447E-02)
-X( 3) = ( -3.16651313021328E+00,  2.26043823277333E+00)
-X( 4) = (  2.99237735281988E+00,  1.29653142665103E+00)
-
-X( 5) = (  1.63709426784050E-01,  1.29552233868960E-01)
-
-PATH NUMBER =      1695
-
-ARCLEN =  1.65868876549097E+00
-NFE =  454
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99186611406095E-01
-
-X( 1) = ( -1.62595032090005E-01,  1.00801883001496E-01)
-X( 2) = (  7.32302670904298E-01,  1.02153269371373E-01)
-X( 3) = ( -9.88490929336152E-01,  7.54538630252457E-01)
-X( 4) = (  9.26028939179186E-01,  3.23635160654453E-01)
-
-X( 5) = (  1.95452864642679E-01,  3.21736909107409E-01)
-
-PATH NUMBER =      1696
-
-ARCLEN =  1.78118583154086E+00
-NFE =  430
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999125384220E-01
-
-X( 1) = (  3.48247639857514E-01,  1.18443360588123E+00)
-X( 2) = (  4.58260313709080E-01, -6.62956257369332E-02)
-X( 3) = ( -3.55216282369433E-01,  3.02945797438417E+00)
-X( 4) = (  2.79349287862976E+00,  4.38532634667049E-01)
-
-X( 5) = ( -1.25177897656851E-02,  1.97675010543183E-01)
-
-PATH NUMBER =      1697
-
-ARCLEN =  1.78185227313936E+00
-NFE =  177
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.92524437161718E-07
-
-X( 1) = ( -2.86885971902435E+06, -1.59031845217543E+06)
-X( 2) = (  1.50554307119246E-01, -2.34891915672840E-01)
-X( 3) = ( -5.74244444568337E+05, -2.74676701831014E+06)
-X( 4) = (  8.91636788026763E-01,  6.10473712286414E-02)
-
-X( 5) = (  1.16431117735082E-07, -8.81744142966750E-08)
-
-PATH NUMBER =      1698
-
-ARCLEN =  2.14646482986159E+00
-NFE =  349
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99982643581744E-01
-
-X( 1) = ( -2.98683855852709E-02, -6.21382084964426E-02)
-X( 2) = (  9.55411296678695E-01, -1.95263430292689E-01)
-X( 3) = ( -1.21973985644796E+00,  1.66864279285337E+00)
-X( 4) = (  1.56389438295564E+00,  1.35302968088402E+00)
-
-X( 5) = (  1.07716314355302E-01,  3.61677608965457E-01)
-
-PATH NUMBER =      1699
-
-ARCLEN =  4.18462295746119E+00
-NFE =  244
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.38082285899815E-05
-
-X( 1) = ( -2.02541471385317E+05, -1.48051404989824E+05)
-X( 2) = (  1.06299061852328E-01,  2.53726002765064E-01)
-X( 3) = (  2.35766706394983E+05,  1.92253201104925E+05)
-X( 4) = (  8.78077805212793E-01, -6.92161264710231E-02)
-
-X( 5) = (  4.39230605110556E-08,  5.74194619302744E-06)
-
-PATH NUMBER =      1700
-
-ARCLEN =  2.65651739126562E+00
-NFE =  364
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98451581636530E-01
-
-X( 1) = ( -4.65698279210226E-01, -1.45566435081358E-01)
-X( 2) = ( -6.51724040626881E-01, -1.46248489688624E+00)
-X( 3) = (  2.75699285041375E-01,  1.93185177225560E+00)
-X( 4) = (  8.64985695383060E-01,  4.32538397511639E-04)
-
-X( 5) = (  1.73867190705036E-01,  7.12017759006870E-01)
-
-PATH NUMBER =      1701
-
-ARCLEN =  3.04613622754437E+00
-NFE =  230
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95094059586479E-01
-
-X( 1) = (  8.67574226750813E-02, -1.99608307489624E-01)
-X( 2) = (  1.22572523737156E+00, -2.89599125853959E-01)
-X( 3) = ( -1.31897242903771E+00,  5.22484121835817E-01)
-X( 4) = (  5.39574203278963E-01,  7.83057176226378E-02)
-
-X( 5) = (  2.45488866810106E-01,  4.34007546334268E-01)
-
-PATH NUMBER =      1702
-
-ARCLEN =  1.93146957976225E+00
-NFE =  424
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98011324195074E-01
-
-X( 1) = (  3.46050751957413E-01, -3.00977637369439E-01)
-X( 2) = (  6.37485993150114E-01, -4.11670974174595E-01)
-X( 3) = ( -1.51721603056688E+00, -2.56615513758560E-01)
-X( 4) = (  6.55574867429473E-01,  5.14159544180570E-01)
-
-X( 5) = (  7.38162810387965E-01, -1.79374095515067E-01)
-
-PATH NUMBER =      1703
-
-ARCLEN =  3.54334730887436E+00
-NFE =  366
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98528042799760E-01
-
-X( 1) = (  3.60330380428863E-01,  9.12536620112470E-02)
-X( 2) = (  6.18472969431408E-01, -4.53591497119811E-01)
-X( 3) = ( -8.29498501924506E-01,  2.64779080215433E-01)
-X( 4) = (  5.79213377756251E-01,  2.11712967712104E-01)
-
-X( 5) = (  2.22187760189730E-01,  1.04709571568320E+00)
-
-PATH NUMBER =      1704
-
-ARCLEN =  1.97016186400272E+00
-NFE =  627
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99170452886221E-01
-
-X( 1) = (  1.15473057516249E-01,  3.43697784332543E-01)
-X( 2) = (  6.18510701327570E-01,  1.25900929360024E-01)
-X( 3) = ( -1.21357442816065E+00,  2.09342771041420E-02)
-X( 4) = (  8.39315771587922E-01,  5.07314311435981E-01)
-
-X( 5) = (  3.65117097115971E-01,  3.98379380111469E-01)
-
-PATH NUMBER =      1705
-
-ARCLEN =  2.85989592646147E+00
-NFE =  459
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.94450393027889E-07
-
-X( 1) = (  7.49514893985423E-01,  9.20322445307169E-01)
-X( 2) = (  4.52353063949027E-01, -1.05630581255970E-01)
-X( 3) = (  1.85601898700915E+06, -1.22726638956428E+06)
-X( 4) = ( -6.38760763858749E+05, -8.38213455373758E+05)
-
-X( 5) = ( -3.46555867797511E-07, -1.95967555127958E-07)
-
-PATH NUMBER =      1706
-
-ARCLEN =  6.04639069105008E+00
-NFE =  394
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999643498953E-01
-
-X( 1) = ( -1.79882919213220E+00, -4.76264330787852E+00)
-X( 2) = (  5.65848074010257E-01,  2.52865499873266E-01)
-X( 3) = (  5.46613016055752E+00, -1.46636296017317E+00)
-X( 4) = ( -7.81829679210703E+00, -2.27972930617743E+00)
-
-X( 5) = ( -2.79464493129762E-01, -8.75588438205344E-02)
-
-PATH NUMBER =      1707
-
-ARCLEN =  1.92343008753664E+00
-NFE =  412
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999774008032E-01
-
-X( 1) = (  1.14216712900353E+00,  3.49981605701412E-01)
-X( 2) = ( -1.35599990617711E-01,  1.02712326982643E-01)
-X( 3) = (  2.20892436933937E+00,  1.86995196293957E+00)
-X( 4) = (  8.74155413647688E-01, -1.69188797568957E-01)
-
-X( 5) = ( -1.75083282298287E-01,  1.23239527114003E-01)
-
-PATH NUMBER =      1708
-
-ARCLEN =  3.34925795907660E+00
-NFE =  357
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.86007312370105E-01
-
-X( 1) = (  6.41648307836504E-01, -2.69110690389979E-01)
-X( 2) = (  7.31070841570662E-01,  3.45355536120482E-01)
-X( 3) = ( -2.11460150247230E-01, -1.55805012727147E+00)
-X( 4) = ( -4.91625232024689E-01,  1.95620661908886E-02)
-
-X( 5) = ( -4.78460031635530E-01, -1.02221047382090E+00)
-
-PATH NUMBER =      1709
-
-ARCLEN =  2.84560800946928E+00
-NFE =  225
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.13666318238368E-08
-
-X( 1) = ( -1.64940838899023E+00,  5.37055039200495E-01)
-X( 2) = (  2.07305590336681E+07,  5.86909711430046E+07)
-X( 3) = (  8.80257457597502E+07, -1.98499761099458E+07)
-X( 4) = (  6.30623958424674E-01,  2.84297785891413E-03)
-
-X( 5) = ( -9.29430853552913E-09,  3.52435913059893E-09)
-
-PATH NUMBER =      1710
-
-ARCLEN =  2.49018052584238E+00
-NFE =  312
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99993369822281E-01
-
-X( 1) = (  6.51879196238925E-01, -2.57959585095649E-01)
-X( 2) = ( -9.02865120780110E-01, -2.44549254250093E+00)
-X( 3) = ( -2.49542639362210E+00, -8.47813434299684E-01)
-X( 4) = (  5.42043493974449E-01,  1.53460431404237E-01)
-
-X( 5) = (  1.07204396041385E-01, -1.88432630677558E-01)
-
-PATH NUMBER =      1711
-
-ARCLEN =  1.12013577562372E+00
-NFE =  201
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.79557127382424E-01
-
-X( 1) = (  2.48511403874329E-01, -3.99300983571239E-01)
-X( 2) = (  1.12145346968388E+00, -5.91800320808618E-01)
-X( 3) = ( -1.53172993249656E+00,  6.67115578528338E-02)
-X( 4) = (  5.09073332000531E-01,  6.51854526560007E-02)
-
-X( 5) = (  7.81107005911070E-01,  3.33573233705508E-01)
-
-PATH NUMBER =      1712
-
-ARCLEN =  2.09173417263914E+00
-NFE =  268
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93286533901133E-01
-
-X( 1) = (  2.60362286275671E-01, -2.16590401200235E-01)
-X( 2) = (  1.35537844962327E+00, -4.74704844600951E-01)
-X( 3) = ( -1.63685909735762E+00,  9.24516933688745E-02)
-X( 4) = (  4.84187123531139E-01,  5.53579602740513E-02)
-
-X( 5) = (  4.87378318017516E-01,  5.07966520280113E-01)
-
-PATH NUMBER =      1713
-
-ARCLEN =  1.61105210529395E+00
-NFE =  372
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96113422324138E-01
-
-X( 1) = ( -3.28063875766883E-02,  2.72553679163200E-01)
-X( 2) = (  7.47595875500580E-01,  1.89261772497336E-01)
-X( 3) = ( -9.42905414418919E-01, -2.30559917438757E-02)
-X( 4) = (  7.18775453558808E-01,  1.47893591616896E-01)
-
-X( 5) = (  3.01304497306312E-01,  4.00715315211424E-01)
-
-PATH NUMBER =      1714
-
-ARCLEN =  1.91643073698780E+00
-NFE =  504
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99413155864663E-01
-
-X( 1) = (  2.18308149730081E-01,  6.14023604479471E-01)
-X( 2) = (  7.23314457607755E-01,  1.07850421824411E-01)
-X( 3) = ( -7.43639706229327E-01, -2.97275191091422E-01)
-X( 4) = (  4.31746221147232E-01,  3.60135526768530E-01)
-
-X( 5) = (  9.09451190865247E-02,  6.54021441988103E-01)
-
-PATH NUMBER =      1715
-
-ARCLEN =  1.66426068395163E+00
-NFE =  359
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999993937469E-01
-
-X( 1) = (  1.75586787981671E+00,  3.02826940448706E+00)
-X( 2) = (  4.86723570261269E-01, -4.22964665299781E-01)
-X( 3) = ( -2.03963151638672E+00,  3.69594003799994E+00)
-X( 4) = (  5.18535221155137E-01,  2.73194474539107E-01)
-
-X( 5) = ( -2.19100681637228E-02,  1.12573837395932E-01)
-
-PATH NUMBER =      1716
-
-ARCLEN =  1.73403695481889E+00
-NFE =  210
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.31999098754127E-08
-
-X( 1) = ( -5.04232856278586E+06, -2.26181549249629E+06)
-X( 2) = (  3.33946064938021E-02,  1.04790476914300E-01)
-X( 3) = ( -6.66797825839429E+06, -7.16948003221135E+05)
-X( 4) = (  9.59720428460533E-01, -2.19755693914756E-02)
-
-X( 5) = (  5.95174151220399E-08, -2.09719003816701E-09)
-
-PATH NUMBER =      1717
-
-ARCLEN =  1.44503695583041E+00
-NFE =  268
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998339730E-01
-
-X( 1) = ( -7.26335811752854E+00, -1.46596928385272E+00)
-X( 2) = (  5.32387248975325E-01, -4.84298054223704E-01)
-X( 3) = ( -9.20426995381485E+00,  2.81868133223374E+00)
-X( 4) = (  5.34348206018342E-01,  1.94534952679728E-01)
-
-X( 5) = (  4.10782951279679E-02,  1.33860795922355E-02)
-
-PATH NUMBER =      1718
-
-ARCLEN =  3.84178965052285E+00
-NFE =  282
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.27043865053180E-08
-
-X( 1) = (  2.20131016462017E+06,  8.59425065849623E+05)
-X( 2) = (  1.12205817762583E+00,  6.01547621423786E-03)
-X( 3) = (  2.55704142835084E+06, -4.86990353857020E+06)
-X( 4) = ( -4.08323414800191E-02,  2.55243885212297E-04)
-
-X( 5) = ( -7.13848035630710E-08, -7.74964572547747E-08)
-
-PATH NUMBER =      1719
-
-ARCLEN =  3.73601748568021E+00
-NFE =  238
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.08100930441588E-08
-
-X( 1) = ( -1.41919085117767E+00,  4.00126950464535E-02)
-X( 2) = ( -5.56784093053382E+07,  4.14852387457660E+07)
-X( 3) = (  1.33070544995394E+08, -1.98161934332576E+07)
-X( 4) = (  6.32176340870282E-01,  3.53733571145116E-04)
-
-X( 5) = ( -8.64424208867629E-09, -3.47965499263806E-09)
-
-PATH NUMBER =      1720
-
-ARCLEN =  1.80000695507474E+00
-NFE =  257
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90254842317204E-01
-
-X( 1) = (  3.81385829926153E-01, -4.32079932917687E-02)
-X( 2) = (  1.34375691999483E+00, -3.23865469456385E-01)
-X( 3) = ( -1.34816639360327E+00, -3.42003305518646E-01)
-X( 4) = (  3.37035052924781E-01, -1.66189528730365E-01)
-
-X( 5) = (  5.64430137446349E-01,  8.19212622090855E-01)
-
-PATH NUMBER =      1721
-
-ARCLEN =  1.09639006589776E+00
-NFE =  251
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.89982993803825E-01
-
-X( 1) = (  2.39449130975419E-01,  1.25574483548642E-01)
-X( 2) = (  1.34918101262310E+00,  1.30204723596966E-01)
-X( 3) = ( -1.21522395793196E+00, -2.69190467735408E-01)
-X( 4) = (  4.77710518872370E-01, -8.72749990844978E-02)
-
-X( 5) = (  2.68702008745153E-01,  5.13760440346578E-01)
-
-PATH NUMBER =      1722
-
-ARCLEN =  1.53786538875605E+00
-NFE =  478
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98122378007502E-01
-
-X( 1) = ( -6.50192295634515E-02,  5.49375157410677E-01)
-X( 2) = (  7.98167710124910E-01,  1.49685661845973E-01)
-X( 3) = ( -8.50106306202172E-01, -1.40825528346239E-01)
-X( 4) = (  5.64045596481670E-01,  7.13943202228512E-02)
-
-X( 5) = (  2.02485628457475E-01,  4.31874949133175E-01)
-
-PATH NUMBER =      1723
-
-ARCLEN =  1.51559216881346E+00
-NFE =  523
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99978442992018E-01
-
-X( 1) = ( -2.79371205218681E-01,  1.50966088100867E+00)
-X( 2) = (  8.15970642978769E-01,  8.60365700794986E-02)
-X( 3) = ( -2.21448981723823E-01,  5.57896841895828E-02)
-X( 4) = (  5.59800499122191E-01, -4.86572675005492E-01)
-
-X( 5) = ( -1.14023696020437E-03,  2.80781952705162E-01)
-
-PATH NUMBER =      1724
-
-ARCLEN =  1.92991028580803E+00
-NFE =  339
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999993E-01
-
-X( 1) = ( -4.65578305723345E+00,  2.98434501989278E+01)
-X( 2) = (  5.36040174054795E-01,  1.00369398113305E+00)
-X( 3) = (  4.84411635848348E-01,  4.61023946527836E-02)
-X( 4) = (  5.18258133773498E-01, -7.04692481131323E-01)
-
-X( 5) = ( -5.37369346477352E-03,  2.23644365932807E-02)
-
-PATH NUMBER =      1725
-
-ARCLEN =  1.59088588875265E+00
-NFE =  240
-IFLAG2 = 51
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.70484308837052E-06
-
-X( 1) = ( -1.83591163657789E+05,  8.36547710149536E+02)
-X( 2) = (  4.97149361029666E-01,  1.16841464335859E-01)
-X( 3) = ( -9.30148304187201E+04,  2.21512162789594E+04)
-X( 4) = (  5.09837356921444E-01, -9.87812590905684E-01)
-
-X( 5) = (  2.43318476184109E-06,  9.51613070045479E-07)
-
-PATH NUMBER =      1726
-
-ARCLEN =  3.01330740091571E+00
-NFE =  341
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.08256946552799E-06
-
-X( 1) = ( -6.59757932613265E-01,  2.84318402964248E-01)
-X( 2) = (  8.15180364089174E-01,  5.07712910682405E-02)
-X( 3) = (  2.98904951037914E+06,  1.72648504688807E+06)
-X( 4) = ( -2.73151857142121E-03, -3.11189791471004E-02)
-
-X( 5) = ( -1.87728077479128E-07,  9.67754106483360E-08)
-
-PATH NUMBER =      1727
-
-ARCLEN =  2.51541530003284E+00
-NFE =  732
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99968518394494E-01
-
-X( 1) = ( -3.20197029618045E-01,  1.89853882129976E+00)
-X( 2) = (  5.03151302113608E-01, -2.41067811467805E-02)
-X( 3) = ( -8.33191151450142E-01,  4.17268813139601E-01)
-X( 4) = (  7.57202600614591E-01, -3.03438660362526E-01)
-
-X( 5) = (  4.49575012224724E-02,  2.34098734670385E-01)
-
-PATH NUMBER =      1728
-
-ARCLEN =  2.99559165704901E+00
-NFE =  355
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999577315265E-01
-
-X( 1) = (  5.73658221971719E-01,  1.46224862612116E-01)
-X( 2) = (  5.97190542181904E-01, -4.97879786717898E-01)
-X( 3) = ( -2.74356752893868E+00,  9.21176789508486E-02)
-X( 4) = ( -1.62542689983902E+00, -1.95449304174870E+00)
-
-X( 5) = (  1.98345910361135E-01,  1.58339727427111E-01)
-
-PATH NUMBER =      1729
-
-ARCLEN =  2.31121028325458E+00
-NFE =  426
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94734450070506E-01
-
-X( 1) = (  1.65488003402788E-01,  7.28389721820685E-02)
-X( 2) = (  1.19469655696606E+00, -8.50592382395295E-02)
-X( 3) = ( -7.77127216241652E-01, -6.14785011374900E-01)
-X( 4) = (  3.93446075267574E-01, -3.44905212230622E-01)
-
-X( 5) = (  5.21528300943903E-01,  9.59218390485582E-01)
-
-PATH NUMBER =      1730
-
-ARCLEN =  1.52426356644985E+00
-NFE =  334
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98810686389040E-01
-
-X( 1) = ( -2.97914810448547E-01,  6.43015264758649E-01)
-X( 2) = (  7.41120343221418E-01,  1.03499843224896E-01)
-X( 3) = ( -5.83325646215698E-01,  3.81409319214698E-02)
-X( 4) = (  6.29377791701248E-01, -5.51780116129544E-01)
-
-X( 5) = (  1.57495461863950E-01,  3.40085335316061E-01)
-
-PATH NUMBER =      1731
-
-ARCLEN =  2.48568674809297E+00
-NFE =  451
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.70523340726602E-07
-
-X( 1) = ( -2.18633382972387E+05,  1.10335908565690E+06)
-X( 2) = (  7.41957066695044E-01,  2.83924243172650E-02)
-X( 3) = ( -2.41709045821267E-01,  1.69296308829480E-01)
-X( 4) = (  3.50143290355534E+05, -3.75621363920036E+05)
-
-X( 5) = ( -2.09916755646803E-08,  7.02004569695257E-07)
-
-PATH NUMBER =      1732
-
-ARCLEN =  1.32300976702482E+00
-NFE =  290
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99935772383356E-01
-
-X( 1) = ( -8.37149778842944E-01,  1.07544930911504E+00)
-X( 2) = (  5.69472475761719E-01,  2.73498848337442E-01)
-X( 3) = ( -4.42526024060157E-01,  4.35106563090319E-02)
-X( 4) = (  8.11399056467001E-01, -2.59311313926918E-02)
-
-X( 5) = (  1.25347073792180E-01,  2.69722597199804E-01)
-
-PATH NUMBER =      1733
-
-ARCLEN =  1.31753023375465E+00
-NFE =  291
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99959316874815E-01
-
-X( 1) = ( -7.48327882136037E-02,  1.74226468155442E+00)
-X( 2) = (  9.20163572184462E-01,  3.31157857441116E-01)
-X( 3) = (  7.93341615854458E-02,  2.03905033178237E-01)
-X( 4) = (  4.95917802943067E-01, -6.65773553377950E-01)
-
-X( 5) = ( -3.45111097504679E-02,  2.26993146118713E-01)
-
-PATH NUMBER =      1734
-
-ARCLEN =  1.60078220744268E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998077847E-01
-
-X( 1) = ( -6.24255897642167E+00,  5.20918417214761E+00)
-X( 2) = (  5.23207112046305E-01, -4.61937815944690E-01)
-X( 3) = ( -2.49612510009624E+00,  4.36423232611993E+00)
-X( 4) = (  5.38254974432245E-01,  2.39178251174514E-01)
-
-X( 5) = (  2.28707250617781E-02,  4.93612949164895E-02)
-
-PATH NUMBER =      1735
-
-ARCLEN =  1.71154306835137E+00
-NFE =  186
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.66682271948167E-09
-
-X( 1) = (  1.04807492444977E+08, -5.04536621434000E+07)
-X( 2) = (  4.58576614550753E-01, -2.96517505542560E-01)
-X( 3) = (  1.43342955513039E+08, -3.92531804480336E+07)
-X( 4) = (  7.19281711935600E+07,  9.56646295069164E+07)
-
-X( 5) = ( -1.93194574406178E-09, -1.46024860129060E-09)
-
-PATH NUMBER =      1736
-
-ARCLEN =  1.51857699287746E+00
-NFE =  353
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99375756181606E-01
-
-X( 1) = ( -4.59717941801473E-01,  7.03555192285203E-01)
-X( 2) = (  7.93303474547445E-01,  5.41571457909526E-02)
-X( 3) = ( -3.42122932921981E-01,  1.56520196282984E-02)
-X( 4) = (  7.51245227320160E-01, -5.49636817663771E-01)
-
-X( 5) = (  1.31357388588972E-01,  3.56584290710213E-01)
-
-PATH NUMBER =      1737
-
-ARCLEN =  2.13944663206069E+00
-NFE =  325
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96340983007616E-01
-
-X( 1) = ( -1.72044624788199E-01, -1.43922386857424E-01)
-X( 2) = (  9.61309104347147E-01, -2.65539298784080E-01)
-X( 3) = ( -1.26542710209157E+00,  2.29058935490928E-01)
-X( 4) = (  6.41541240816783E-01,  3.44598607105547E-02)
-
-X( 5) = (  3.70954512929017E-01,  3.22335533811649E-01)
-
-PATH NUMBER =      1738
-
-ARCLEN =  1.56394357257869E+00
-NFE =  366
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96113748518943E-01
-
-X( 1) = ( -9.43043322657297E-02, -7.22798578851386E-02)
-X( 2) = (  1.00140845260761E+00, -1.56129927074585E-01)
-X( 3) = ( -1.23065553840447E+00,  1.02633668894938E-01)
-X( 4) = (  6.04004515488282E-01, -3.98505318085448E-02)
-
-X( 5) = (  3.63250636514606E-01,  3.48263185235835E-01)
-
-PATH NUMBER =      1739
-
-ARCLEN =  2.27659374614111E+00
-NFE =  268
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.04345837317882E-06
-
-X( 1) = ( -6.48106821352473E-02,  5.01942567767379E-05)
-X( 2) = (  1.17208371754231E+00,  3.47565706371747E-01)
-X( 3) = ( -3.69375941474434E+05, -5.39882347663036E+03)
-X( 4) = (  1.02717906998136E+00, -2.43224006055060E-01)
-
-X( 5) = (  1.97241650583233E-06,  6.55082788877763E-08)
-
-PATH NUMBER =      1740
-
-ARCLEN =  1.74000292398352E+00
-NFE =  225
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.73669863535228E-12
-
-X( 1) = ( -1.33273438771156E+10, -6.94157669683429E+10)
-X( 2) = (  5.08391687788961E-01,  3.01192020461016E-01)
-X( 3) = ( -4.03660859215829E+10, -1.68917906574119E+10)
-X( 4) = (  7.13548419289904E+09,  4.60710976195740E+10)
-
-X( 5) = (  4.13548974795633E-12, -5.41828165450883E-12)
-
-PATH NUMBER =      1741
-
-ARCLEN =  1.20107315499601E+00
-NFE =  293
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98432846090722E-01
-
-X( 1) = ( -1.78254441055914E-01,  6.38183029762665E-01)
-X( 2) = (  1.00820996654808E+00,  2.81043159606163E-01)
-X( 3) = (  9.11593514796816E-02,  1.87956211620052E-01)
-X( 4) = (  6.28880719992659E-01, -5.52464213324604E-01)
-
-X( 5) = ( -8.34698061896246E-03,  3.48112239746778E-01)
-
-PATH NUMBER =      1742
-
-ARCLEN =  1.52655047986064E+00
-NFE =  191
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.80121668527721E-10
-
-X( 1) = (  7.02235303996645E+08, -3.16604402883564E+08)
-X( 2) = (  5.07446054051515E-01,  2.88274950252960E-01)
-X( 3) = (  2.86219658877608E+07, -4.23545399547144E+08)
-X( 4) = ( -6.03418852600851E+08,  1.62876832288715E+08)
-
-X( 5) = ( -4.54766157403138E-10, -5.12639647582986E-10)
-
-PATH NUMBER =      1743
-
-ARCLEN =  1.32483924890016E+00
-NFE =  136
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.73318561609043E-13
-
-X( 1) = ( -6.57009998263792E+10,  1.02581064333101E+11)
-X( 2) = (  4.98816222191503E-01,  2.90471710670854E-01)
-X( 3) = (  2.54601697740507E+10,  8.11217444456106E+10)
-X( 4) = (  1.98753471304964E+10, -6.08966419268148E+10)
-
-X( 5) = (  2.94679970529177E-13,  3.53743466810497E-12)
-
-PATH NUMBER =      1744
-
-ARCLEN =  1.51179947299451E+00
-NFE =  184
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.28599432934843E-10
-
-X( 1) = (  2.10080667776248E+09, -3.58694815187655E+09)
-X( 2) = (  5.01942181628715E-01, -2.72754606847848E-01)
-X( 3) = ( -1.27021981288388E+09, -2.19106324148222E+09)
-X( 4) = ( -1.98195852390199E+09,  2.62069725299780E+09)
-
-X( 5) = ( -1.02431548215220E-11, -1.20447211503661E-10)
-
-PATH NUMBER =      1745
-
-ARCLEN =  1.32493878780902E+00
-NFE =  139
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.57060160364966E-11
-
-X( 1) = ( -5.45337949158038E+09,  5.42312175378833E+09)
-X( 2) = (  4.91729323322747E-01, -2.96557646057462E-01)
-X( 3) = (  1.84382463839201E+09,  8.97705942344471E+09)
-X( 4) = ( -3.61504368637670E+09, -8.49932467368827E+09)
-
-X( 5) = (  6.08429973070201E-12,  3.71043609791004E-11)
-
-PATH NUMBER =      1746
-
-ARCLEN =  2.06120961246839E+00
-NFE =  220
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.72433130992619E-07
-
-X( 1) = ( -1.04736876637712E-01,  4.76353662282406E-03)
-X( 2) = (  8.94112290124326E-01,  2.69276355543949E-02)
-X( 3) = ( -2.90335297360243E+05, -5.08402330322827E+06)
-X( 4) = (  4.52625988327616E+06,  5.00622328071322E+06)
-
-X( 5) = ( -6.30102278638195E-09, -9.29283341499342E-08)
-
-PATH NUMBER =      1747
-
-ARCLEN =  2.72974400423130E+00
-NFE =  337
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97265693796406E-01
-
-X( 1) = ( -2.64036768563171E-02, -6.38905435833296E-02)
-X( 2) = (  1.84081643360472E+00,  1.10949202284575E+00)
-X( 3) = ( -1.49231941371830E+00, -1.14177495020834E+00)
-X( 4) = (  9.21572629614866E-01, -4.39990115699665E-02)
-
-X( 5) = (  3.52270542743370E-01,  2.16344295919484E-01)
-
-PATH NUMBER =      1748
-
-ARCLEN =  2.72105641065408E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999935E-01
-
-X( 1) = ( -1.35386369018930E+02,  7.04669599648350E+00)
-X( 2) = (  1.08092107255252E+00,  1.52097049884924E-02)
-X( 3) = ( -1.03195205074942E-01,  1.86067554963155E-02)
-X( 4) = (  1.15143326679433E+02,  8.07424120591084E+01)
-
-X( 5) = (  6.49895074079058E-03,  1.06616268836543E-04)
-
-PATH NUMBER =      1749
-
-ARCLEN =  1.52130485898830E+00
-NFE =  320
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99572850056621E-01
-
-X( 1) = ( -4.01472290962675E-01,  9.36533595138258E-03)
-X( 2) = (  1.01620052815273E+00,  2.40098110724865E-01)
-X( 3) = ( -7.81315769116300E-02,  1.24856781728833E-01)
-X( 4) = (  1.35439728216070E+00, -2.79656889178915E-01)
-
-X( 5) = (  2.42682556266666E-01,  4.91170675441416E-01)
-
-PATH NUMBER =      1750
-
-ARCLEN =  1.85325291791698E+00
-NFE =  383
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999105567E-01
-
-X( 1) = ( -1.81712576759303E+00,  5.29179204319743E+00)
-X( 2) = (  4.83668978230602E-01,  2.25784839620901E-01)
-X( 3) = ( -2.41930488898914E-02,  1.04522386745436E-01)
-X( 4) = (  1.01206973969877E+00,  7.57856329996748E-02)
-
-X( 5) = ( -2.98261412340050E-03,  1.14722590807967E-01)
-
-PATH NUMBER =      1751
-
-ARCLEN =  1.54273527814767E+00
-NFE =  394
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97269677882544E-01
-
-X( 1) = ( -2.25210070971720E-01,  3.42438579973711E-01)
-X( 2) = (  6.97945021103949E-01,  1.80943575086746E-01)
-X( 3) = ( -8.64237849702769E-01,  9.48023186926827E-02)
-X( 4) = (  7.46952517096306E-01,  9.40243960000836E-02)
-
-X( 5) = (  2.49201740154383E-01,  3.47758217048100E-01)
-
-PATH NUMBER =      1752
-
-ARCLEN =  1.35392722041481E+00
-NFE =  215
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.28991508828955E-07
-
-X( 1) = ( -3.71598033580937E+06,  1.15374752826878E+06)
-X( 2) = (  1.72806478396684E-02,  7.50188953519703E-02)
-X( 3) = ( -3.85501099074948E+06,  2.72658175884213E+06)
-X( 4) = (  9.68366181073650E-01, -3.16878361399227E-02)
-
-X( 5) = (  6.53715506235676E-08,  5.36776028558453E-08)
-
-PATH NUMBER =      1753
-
-ARCLEN =  2.55967229745375E+00
-NFE =  253
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.63811953385032E-09
-
-X( 1) = ( -8.12350370428973E+07,  2.43792549214649E+07)
-X( 2) = (  5.46378945372586E-01,  2.40646298851268E-01)
-X( 3) = ( -2.74471866581349E+07, -4.01137443783691E+07)
-X( 4) = (  1.92348641699128E+08, -1.35219739299512E+08)
-
-X( 5) = (  3.83924457931497E-09, -6.65026699182315E-10)
-
-PATH NUMBER =      1754
-
-ARCLEN =  1.16445448861006E+00
-NFE =  103
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.95826163644882E-12
-
-X( 1) = ( -8.13347846183325E+10, -5.22343851482356E+10)
-X( 2) = (  4.96229807872890E-01, -2.83875912934076E-01)
-X( 3) = ( -9.38278728118046E+10,  8.61394379579311E+10)
-X( 4) = (  7.48149004177592E+10, -4.03089838776788E+10)
-
-X( 5) = (  3.17839859791634E-12,  8.00104232000221E-13)
-
-PATH NUMBER =      1755
-
-ARCLEN =  2.84337296423878E+00
-NFE =  291
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999858E-01
-
-X( 1) = ( -1.24660109263293E+02, -1.96397104140901E+01)
-X( 2) = (  1.13874119192967E+00, -7.53605779306773E-02)
-X( 3) = ( -3.13319363892644E-02, -8.71077511049276E-02)
-X( 4) = (  4.10604844298484E+01,  6.86254568480708E+01)
-
-X( 5) = (  7.05661113485129E-03,  2.82130095069401E-04)
-
-PATH NUMBER =      1756
-
-ARCLEN =  1.51716084473907E+00
-NFE =  345
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97254958177575E-01
-
-X( 1) = ( -9.14937395784028E-02, -3.53263301681148E-01)
-X( 2) = (  5.04724812747840E-01, -3.45514901759489E-02)
-X( 3) = ( -4.38057647851555E-01,  2.95578058101702E-01)
-X( 4) = (  9.90570909275321E-01, -7.45709648070517E-02)
-
-X( 5) = (  5.98632348950896E-01,  4.01997084096326E-01)
-
-PATH NUMBER =      1757
-
-ARCLEN =  2.01850581267823E+00
-NFE =  199
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.87057240501547E-09
-
-X( 1) = (  1.03571490241440E+09,  5.50615847457721E+08)
-X( 2) = (  4.72510707509658E-01, -2.05632619885441E-01)
-X( 3) = (  1.19361996732695E+09, -2.59517585087738E+08)
-X( 4) = ( -2.02169809241214E+09, -1.49441634113449E+09)
-
-X( 5) = ( -2.91572213909855E-10,  1.14398888094707E-10)
-
-PATH NUMBER =      1758
-
-ARCLEN =  6.69743752105940E+00
-NFE =  346
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999798449870E-01
-
-X( 1) = (  3.00286787861861E+00,  5.61576914338199E-01)
-X( 2) = (  8.12610646924695E-02,  2.58559729215590E-01)
-X( 3) = ( -3.27402574497812E+00,  8.10444990170074E-01)
-X( 4) = (  8.76507044742009E-01, -8.27385596042783E-02)
-
-X( 5) = (  4.50196684055566E-01,  4.23134404814710E-01)
-
-PATH NUMBER =      1759
-
-ARCLEN =  3.72084000488034E+00
-NFE =  341
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.51443359850793E-09
-
-X( 1) = ( -8.20851726298240E+07,  2.73226220041295E+05)
-X( 2) = (  4.96592737669648E-01,  2.99678205331777E-01)
-X( 3) = ( -6.70967732814218E+06,  2.99027136413757E+07)
-X( 4) = (  9.88148693960545E+07,  2.35325340875646E+07)
-
-X( 5) = (  7.64920437542694E-09,  1.73407408050885E-09)
-
-PATH NUMBER =      1760
-
-ARCLEN =  1.31966774754223E+00
-NFE =  140
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.10622429180921E-11
-
-X( 1) = (  3.29946316384457E+10,  1.38958589426832E+09)
-X( 2) = (  4.98304781865877E-01, -3.01772099734329E-01)
-X( 3) = (  1.84127809807660E+10, -3.63943401853761E+10)
-X( 4) = ( -3.81274439072190E+10, -4.68778971703509E+09)
-
-X( 5) = ( -9.81236419157414E-12, -6.19494039399981E-12)
-
-PATH NUMBER =      1761
-
-ARCLEN =  1.68461540415790E+00
-NFE =  224
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.92682596171848E-08
-
-X( 1) = (  1.77414036503598E+07,  3.67805576623715E+06)
-X( 2) = (  1.04078609269398E-01, -1.66627070014935E-01)
-X( 3) = ( -3.20313378318488E+06, -3.55419216792987E+07)
-X( 4) = (  1.00304907353666E+00, -8.11646473153882E-02)
-
-X( 5) = ( -5.51995700003353E-09, -1.68064408052285E-08)
-
-PATH NUMBER =      1762
-
-ARCLEN =  1.35433443619971E+00
-NFE =  182
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.21496624747764E-07
-
-X( 1) = ( -3.28594442189011E+07, -2.50737380967570E+06)
-X( 2) = ( -1.89179980729748E-01, -1.17269345066561E-01)
-X( 3) = ( -4.13488610992211E+07,  1.33083697514575E+07)
-X( 4) = (  1.02763778862188E+00,  9.54159168095639E-02)
-
-X( 5) = (  8.95385307615889E-09,  3.27508725602712E-09)
-
-PATH NUMBER =      1763
-
-ARCLEN =  5.32625075529276E+00
-NFE =  465
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994933005780E-01
-
-X( 1) = (  5.37747657776287E-01,  1.78587678665778E+00)
-X( 2) = ( -5.27427487228131E-01, -8.88973795448902E-01)
-X( 3) = ( -1.43311229407935E+00, -2.33592826682490E-01)
-X( 4) = (  8.64035098809593E-01, -3.63127163727313E-03)
-
-X( 5) = (  5.13383133303354E-01,  6.20322755891946E-01)
-
-PATH NUMBER =      1764
-
-ARCLEN =  1.77336137469127E+00
-NFE =  295
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98564752873366E-01
-
-X( 1) = ( -4.72712278133840E-01, -4.09554796361941E-01)
-X( 2) = (  7.75765805596683E-01, -7.50971836687011E-02)
-X( 3) = ( -3.86224914411572E-01,  3.77633431999762E-01)
-X( 4) = (  1.31050977842406E+00,  1.81886179534575E-01)
-
-X( 5) = (  5.06300008667192E-01,  3.81798238647124E-01)
-
-PATH NUMBER =      1765
-
-ARCLEN =  2.55657357493400E+00
-NFE =  284
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999990370E-01
-
-X( 1) = ( -2.90834337634433E-02,  7.90711121308363E-03)
-X( 2) = (  1.05655912306909E+00, -1.81369609135344E-03)
-X( 3) = ( -4.45818359117743E+01,  1.79323794016994E+00)
-X( 4) = (  3.77219703197795E+01,  2.81306379102410E+01)
-
-X( 5) = (  1.58108100453582E-02, -5.86803636307212E-03)
-
-PATH NUMBER =      1766
-
-ARCLEN =  1.30351722025494E+00
-NFE =  268
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98222487190390E-01
-
-X( 1) = ( -1.23736828210451E-01, -1.28266861983520E-01)
-X( 2) = (  6.12954690491302E-01, -1.11945469588136E-01)
-X( 3) = ( -1.13931921853561E+00,  2.26556576577066E-01)
-X( 4) = (  9.73341676761538E-01, -3.85644433509261E-02)
-
-X( 5) = (  4.11192971362573E-01,  2.29976040647882E-01)
-
-PATH NUMBER =      1767
-
-ARCLEN =  2.50398598849772E+00
-NFE =  287
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.19433984150652E-10
-
-X( 1) = (  3.94954244645931E+08,  2.09943368218688E+08)
-X( 2) = (  4.86037094545369E-01, -2.81673611409253E-01)
-X( 3) = (  7.91472385909581E+08, -1.00438440694071E+08)
-X( 4) = ( -1.60987573300982E+09, -2.60728718857130E+08)
-
-X( 5) = ( -4.35559157670054E-10,  1.72408662108166E-10)
-
-PATH NUMBER =      1768
-
-ARCLEN =  1.85918667458987E+00
-NFE =  190
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.43039411319263E-10
-
-X( 1) = (  1.47118461712976E+08, -1.24044795189400E+09)
-X( 2) = (  5.00403048656812E-01,  2.61937876745801E-01)
-X( 3) = ( -1.27260200791989E+09, -1.80419336267631E+09)
-X( 4) = ( -1.29723292668953E+09,  2.44433677035952E+09)
-
-X( 5) = (  4.31457225632745E-11, -2.42648528494486E-10)
-
-PATH NUMBER =      1769
-
-ARCLEN =  1.54796993972534E+00
-NFE =  256
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97257065530422E-01
-
-X( 1) = ( -5.67656191434528E-02,  5.75013209402786E-01)
-X( 2) = ( -3.56800379094638E-01,  1.31693293605017E+00)
-X( 3) = (  3.18786216284930E-01,  9.22918415295033E-01)
-X( 4) = (  8.06589199502765E-01, -6.39776927442817E-02)
-
-X( 5) = (  9.51547796502797E-02,  2.58798999878293E-01)
-
-PATH NUMBER =      1770
-
-ARCLEN =  1.46348187708091E+00
-NFE =  228
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999905E-01
-
-X( 1) = ( -3.23463282433245E+01,  8.39909003259983E+01)
-X( 2) = ( -5.06935993176671E-02,  2.51466272832365E-02)
-X( 3) = ( -1.55046125141976E+00,  5.01250147430768E+01)
-X( 4) = (  9.91448458769128E-01,  8.40849975455138E-03)
-
-X( 5) = ( -1.70334531765327E-04,  5.18295178353945E-03)
-
-PATH NUMBER =      1771
-
-ARCLEN =  1.45395208544822E+00
-NFE =  203
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.22290457682056E-07
-
-X( 1) = ( -1.58810154340658E+06,  1.32421145334002E+06)
-X( 2) = (  1.02802656998617E-01,  1.07308385222577E-01)
-X( 3) = (  4.33700415620866E+05,  4.19780172459386E+06)
-X( 4) = (  9.00163248998199E-01,  1.75261687394136E-02)
-
-X( 5) = (  5.73576051961905E-09,  1.20643251536284E-07)
-
-PATH NUMBER =      1772
-
-ARCLEN =  2.17671838139563E+00
-NFE =  317
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.46577105701511E-11
-
-X( 1) = (  4.41118488504892E+08,  1.55301109685623E+10)
-X( 2) = (  5.13698761590080E-01,  2.79859049548670E-01)
-X( 3) = (  2.45407892858014E+10,  2.54836474328465E+10)
-X( 4) = (  1.73776180956331E+10, -2.90337990134750E+10)
-
-X( 5) = ( -7.58086277671648E-12,  1.59606205205401E-11)
-
-PATH NUMBER =      1773
-
-ARCLEN =  2.25101081762439E+00
-NFE =  278
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.81704209617787E-06
-
-X( 1) = ( -1.80873478776206E-01,  1.12628492019137E-01)
-X( 2) = (  4.70784723355724E-01, -3.85700475713014E-01)
-X( 3) = ( -7.48553420040652E+04,  2.33463542732782E+04)
-X( 4) = (  8.73319743787267E-01,  1.01807442117726E-01)
-
-X( 5) = (  8.73347625140284E-06,  3.18938190426067E-06)
-
-PATH NUMBER =      1774
-
-ARCLEN =  1.73642572861923E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98984038977508E-01
-
-X( 1) = ( -1.45316636161116E-01, -4.26755713318079E-02)
-X( 2) = (  8.14206451255294E-01, -4.48099480622802E-01)
-X( 3) = ( -1.40706897039111E+00,  2.06867128370275E-01)
-X( 4) = (  7.34663067560563E-01,  8.74502639726153E-02)
-
-X( 5) = (  4.24263500542519E-01,  2.82028067702046E-01)
-
-PATH NUMBER =      1775
-
-ARCLEN =  2.26099246657836E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.87423308200590E-01
-
-X( 1) = (  3.04781960376762E-01, -5.51717512486778E-01)
-X( 2) = (  6.65265178215259E-01, -2.55998052782665E-01)
-X( 3) = ( -9.09029003756223E-01, -3.91122899102756E-02)
-X( 4) = (  6.68715534105326E-01,  5.70593401585847E-01)
-
-X( 5) = (  1.33469890234906E+00, -3.99335972136478E-01)
-
-PATH NUMBER =      1776
-
-ARCLEN =  2.05351452486771E+00
-NFE =  446
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99952232963496E-01
-
-X( 1) = (  2.29408661333346E-01,  3.93855044034264E-01)
-X( 2) = (  4.88992279203423E-01,  1.03695880407615E-01)
-X( 3) = ( -1.21832128381566E+00,  6.46427513492033E-01)
-X( 4) = (  1.44009505359916E+00,  1.90204911332382E-01)
-
-X( 5) = (  2.60333506465882E-01,  3.29505797120676E-01)
-
-PATH NUMBER =      1777
-
-ARCLEN =  1.79351310611925E+00
-NFE =  190
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.26885103812436E-10
-
-X( 1) = (  1.33924315982316E+09,  6.44283280248358E+08)
-X( 2) = (  5.37832940796202E-01,  2.92517397773932E-01)
-X( 3) = (  3.12676116275070E+09,  2.43028843394014E+09)
-X( 4) = (  5.71705846246886E+08, -4.72337839792054E+09)
-
-X( 5) = ( -1.19821280393333E-10,  1.30802132905332E-10)
-
-PATH NUMBER =      1778
-
-ARCLEN =  1.89313134002439E+00
-NFE =  299
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999996119271E-01
-
-X( 1) = (  6.03804334238741E-01,  5.84229871339544E+00)
-X( 2) = (  4.97093907121763E-01, -4.34049045250093E-01)
-X( 3) = (  7.39807200644168E-01,  2.94283490977957E+00)
-X( 4) = (  4.93037108423007E-01,  2.99522493169800E-01)
-
-X( 5) = ( -3.40012088023513E-02,  7.02970848417678E-02)
-
-PATH NUMBER =      1779
-
-ARCLEN =  1.85093274264454E+00
-NFE =  237
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.21846420198027E-07
-
-X( 1) = ( -1.55343751333697E+05, -1.54120951064398E+06)
-X( 2) = (  5.44353237691443E-02,  6.82250577901954E-02)
-X( 3) = ( -2.78701971221958E+06, -1.49239734564424E+06)
-X( 4) = (  9.83418665142596E-01, -1.30500064713537E-02)
-
-X( 5) = (  1.29117620861779E-07, -9.65530612753729E-08)
-
-PATH NUMBER =      1780
-
-ARCLEN =  1.74266284273007E+00
-NFE =  488
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96884862798103E-01
-
-X( 1) = ( -2.98036436945620E-01, -1.49129071923489E-01)
-X( 2) = (  6.39329019704438E-01, -2.52851303856084E-01)
-X( 3) = ( -6.60914627167496E-01,  6.52721326482989E-01)
-X( 4) = (  8.64083566957190E-01,  1.70403502941627E-01)
-
-X( 5) = (  3.06144300281519E-01,  4.21123831769274E-01)
-
-PATH NUMBER =      1781
-
-ARCLEN =  1.12824102052952E+00
-NFE =  303
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.77240279642758E-01
-
-X( 1) = ( -5.88307954206961E-01, -9.58365414880645E-01)
-X( 2) = (  6.64137712180656E-01, -4.90733784839783E-01)
-X( 3) = ( -1.55307132459182E+00,  7.30158243322567E-01)
-X( 4) = (  6.17564904229413E-01,  1.31398279304221E-01)
-
-X( 5) = (  3.18657455279224E-01,  8.82184087811741E-02)
-
-PATH NUMBER =      1782
-
-ARCLEN =  1.28615794870264E+00
-NFE =  258
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.85979518551710E-01
-
-X( 1) = (  2.75115632679933E-01, -1.34310318043148E+00)
-X( 2) = (  5.55416771224312E-01, -1.98093149047204E-01)
-X( 3) = ( -2.09871950088100E+00, -2.45031082668338E-01)
-X( 4) = (  6.61262843871971E-01,  7.35442599489435E-01)
-
-X( 5) = (  2.77404432577916E-01, -1.41511684197077E-01)
-
-PATH NUMBER =      1783
-
-ARCLEN =  3.20544640185734E+00
-NFE =  334
-IFLAG2 = 71
-COMPLEX, FINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.26400395382816E-06
-
-X( 1) = (  8.40508252207477E-01, -7.05224567165762E-02)
-X( 2) = ( -3.18654121821860E-02, -2.80971581694131E-01)
-X( 3) = (  1.01751861334373E+05,  2.55052076667594E+05)
-X( 4) = (  8.83603931993653E-01,  8.93671212089518E-01)
-
-X( 5) = ( -1.10051384458166E-06,  2.41609796216148E-06)
-
-PATH NUMBER =      1784
-
-ARCLEN =  2.42053974820472E+00
-NFE =  211
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.16619246171910E-07
-
-X( 1) = (  7.35998912061011E-01, -8.43505624594736E-01)
-X( 2) = (  4.55001506410484E-01,  9.03753474410978E-02)
-X( 3) = (  1.06633073769704E+06, -1.26705764081238E+05)
-X( 4) = ( -1.26060901757946E+06, -4.14028444188995E+05)
-
-X( 5) = ( -5.69083923312135E-07,  1.96192131417597E-07)
-
-PATH NUMBER =      1785
-
-ARCLEN =  3.95419730902535E+00
-NFE =  523
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94570031684878E-01
-
-X( 1) = (  8.92869245034147E-02, -1.06151952330753E-01)
-X( 2) = (  5.81169844190463E-01, -8.61026961894162E-02)
-X( 3) = ( -5.82349808909844E-01, -9.29314638492345E-02)
-X( 4) = (  6.26826492413958E-01,  4.64803724381803E-01)
-
-X( 5) = (  9.60197391558083E-01,  9.68876853232540E-01)
-
-PATH NUMBER =      1786
-
-ARCLEN =  4.56483931205927E+00
-NFE =  572
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99992131761410E-01
-
-X( 1) = (  6.51478341179838E-01,  6.83257133790250E-01)
-X( 2) = (  5.71781507592534E-01, -3.22577342771031E-01)
-X( 3) = ( -4.68128315753104E-01,  4.27858473572323E-01)
-X( 4) = (  7.71474879318607E-01,  6.46946842773659E-01)
-
-X( 5) = ( -2.96524752128719E-01,  4.41872930240819E-01)
-
-PATH NUMBER =      1787
-
-ARCLEN =  2.11669543911844E+00
-NFE =  354
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99921440210624E-01
-
-X( 1) = (  2.93064350997192E-01,  4.52260845457978E-01)
-X( 2) = (  2.87719870497129E-01,  1.40334351750638E-01)
-X( 3) = ( -3.02265892065732E-01,  1.21341619446761E+00)
-X( 4) = (  1.15031084121242E+00,  6.28727097600165E-02)
-
-X( 5) = (  3.69643151475488E-02,  3.67367253538791E-01)
-
-PATH NUMBER =      1788
-
-ARCLEN =  2.43440096256205E+00
-NFE =  223
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.52954822999629E-08
-
-X( 1) = ( -1.38734386623222E-01,  2.44001079823334E-01)
-X( 2) = (  7.20561130577809E-01, -8.69153086805630E-02)
-X( 3) = ( -1.43623442302522E+07,  1.55290030888376E+05)
-X( 4) = (  7.94487876350641E+06,  8.20274442518870E+06)
-
-X( 5) = (  5.25414932348869E-08, -1.59761261664068E-08)
-
-PATH NUMBER =      1789
-
-ARCLEN =  5.10683157763909E+00
-NFE =  442
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972304487432E-01
-
-X( 1) = ( -9.83315007381121E-01, -1.73965239816663E-01)
-X( 2) = (  9.51035929407052E-01,  1.06665541780909E-03)
-X( 3) = ( -9.03845048749413E-01, -1.07217129023385E+00)
-X( 4) = ( -1.89191064015008E-01,  1.34128082084480E+00)
-
-X( 5) = (  6.66916599680704E-01,  1.22563806705033E-01)
-
-PATH NUMBER =      1790
-
-ARCLEN =  1.86794720150180E+00
-NFE =  373
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999995635551E-01
-
-X( 1) = ( -2.22325154526453E+00, -5.47640633308170E+00)
-X( 2) = (  5.34644598980140E-01, -5.20312674251818E-01)
-X( 3) = ( -5.69052375770060E+00, -4.89979622886662E+00)
-X( 4) = (  5.19850912426550E-01,  1.60892081529068E-01)
-
-X( 5) = (  4.29188069972460E-02, -3.63420753739837E-02)
-
-PATH NUMBER =      1791
-
-ARCLEN =  4.62687307181973E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999991454E-01
-
-X( 1) = (  9.68015509330232E-01, -7.30738153665952E-02)
-X( 2) = (  3.70402587433006E+02, -1.67275635104806E+02)
-X( 3) = ( -5.53553908579642E-01, -8.76079199425314E-01)
-X( 4) = (  1.24091930027555E+01,  1.11024826227117E+02)
-
-X( 5) = ( -1.88075696215987E-03,  3.23765517932774E-04)
-
-PATH NUMBER =      1792
-
-ARCLEN =  2.37024716124950E+00
-NFE =  339
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90528447098736E-01
-
-X( 1) = (  4.14270081774865E-01, -3.97276640386189E-01)
-X( 2) = (  1.50108608700236E+00, -6.01736256050330E-01)
-X( 3) = ( -1.79757714684569E+00, -6.35230914408994E-01)
-X( 4) = (  4.09752502784274E-01,  1.60636721456665E-01)
-
-X( 5) = (  1.06490270114993E+00, -3.34406282484228E-01)
-
-PATH NUMBER =      1793
-
-ARCLEN =  5.19251833144424E+00
-NFE =  372
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994821668481E-01
-
-X( 1) = (  9.98665667649647E-01,  1.70750884110088E-01)
-X( 2) = ( -3.42715329516558E-01, -1.42190225631369E-01)
-X( 3) = ( -1.83785906639695E+00, -7.93934896889227E-04)
-X( 4) = (  9.55927091161423E-01, -1.15714435187747E-01)
-
-X( 5) = (  4.66831507058123E-01, -4.17685083332326E-02)
-
-PATH NUMBER =      1794
-
-ARCLEN =  7.86332510351212E+00
-NFE =  270
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.10375258065292E-07
-
-X( 1) = (  9.94261668070581E-01,  9.95904732152540E-01)
-X( 2) = (  4.50380890392528E-01, -7.41470194452509E-02)
-X( 3) = (  3.30182354695927E+07, -3.49372650833391E+06)
-X( 4) = ( -2.01702276578736E+07, -1.74592393373757E+07)
-
-X( 5) = ( -2.33247060902860E-08,  4.83605679959219E-09)
-
-PATH NUMBER =      1795
-
-ARCLEN =  2.91237197361986E+00
-NFE =  440
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99746776495047E-01
-
-X( 1) = ( -2.55634772142083E-01,  2.86804446793614E-01)
-X( 2) = (  5.83458345966137E-01, -1.96662292826747E-01)
-X( 3) = ( -4.98062036289342E-02,  2.42833416483168E-01)
-X( 4) = (  6.20947360550290E-01,  2.21019290051716E-01)
-
-X( 5) = (  9.30328725863541E-03,  6.24083939665178E-01)
-
-PATH NUMBER =      1796
-
-ARCLEN =  2.79199800614632E+00
-NFE =  231
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.79948902202388E-08
-
-X( 1) = ( -1.48415500079154E-02,  4.01474823818279E-01)
-X( 2) = (  7.08161885097013E-01, -1.60633499946211E-01)
-X( 3) = ( -1.23141643347647E+07, -2.18019856075945E+07)
-X( 4) = ( -9.68074518927636E+06,  6.41738514848132E+06)
-
-X( 5) = (  1.52066734509962E-08, -3.17541477628473E-08)
-
-PATH NUMBER =      1797
-
-ARCLEN =  2.94519745859869E+00
-NFE =  391
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999891957E-01
-
-X( 1) = (  1.11044355027198E+01,  5.85240365274676E+00)
-X( 2) = ( -3.88114178406164E-01, -8.96866690447155E-02)
-X( 3) = ( -2.39891321053553E+00,  4.16940888571811E+00)
-X( 4) = (  8.71835961146137E-01, -4.36058639678795E-03)
-
-X( 5) = ( -5.85470802787923E-02,  3.14937822849124E-02)
-
-PATH NUMBER =      1798
-
-ARCLEN =  3.13717166452739E+00
-NFE =  379
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98713227217685E-01
-
-X( 1) = (  4.73650409110600E-01, -4.37098136484440E-01)
-X( 2) = (  7.58726618003654E-01,  2.25975986228923E-01)
-X( 3) = (  4.15432615051222E-01, -1.12566066367267E+00)
-X( 4) = ( -2.68055059617090E-01, -2.77743116519520E-01)
-
-X( 5) = ( -8.75743685373657E-01, -5.08720436463663E-01)
-
-PATH NUMBER =      1799
-
-ARCLEN =  3.19741276085388E+00
-NFE =  262
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.35199565411486E-08
-
-X( 1) = (  8.98659717661533E-01,  5.27148274551633E-06)
-X( 2) = (  7.52727527483033E+06,  5.19832970159091E+06)
-X( 3) = (  5.57364868843820E+06, -4.61825383530231E+06)
-X( 4) = ( -1.15906028542046E-01,  3.86518063899501E-03)
-
-X( 5) = ( -8.65877569795599E-08,  3.08590862606642E-08)
-
-PATH NUMBER =      1800
-
-ARCLEN =  2.66424476855864E+00
-NFE =  654
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99698910572757E-01
-
-X( 1) = (  3.15244413822648E-01, -3.82297173971478E-02)
-X( 2) = (  8.31587552487247E-01, -5.63276136967719E-01)
-X( 3) = ( -1.37236923559066E+00, -8.79015917690296E-01)
-X( 4) = (  5.30942676871546E-01,  4.44179802086567E-01)
-
-X( 5) = (  6.83305891037770E-01, -6.85813009249359E-01)
-
-PATH NUMBER =      1801
-
-ARCLEN =  1.44575484239491E+00
-NFE =  345
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.86243626286782E-01
-
-X( 1) = (  5.95113777764838E-02, -2.41707128406196E-01)
-X( 2) = (  1.01736620332262E+00, -3.11801307645993E-01)
-X( 3) = ( -1.19481952292506E+00, -3.69181123823810E-01)
-X( 4) = (  5.03720112947937E-01, -6.76915688401361E-02)
-
-X( 5) = (  7.78740708469492E-01,  2.38978673349180E-01)
-
-PATH NUMBER =      1802
-
-ARCLEN =  3.26576992650157E+00
-NFE =  381
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.88438365365035E-01
-
-X( 1) = (  3.61926426039839E-01,  1.87208922280763E-01)
-X( 2) = (  8.44473175032187E-01,  2.89821738527232E-02)
-X( 3) = ( -7.95287035939371E-01, -8.71802515897029E-01)
-X( 4) = (  2.53395540469048E-01,  1.55342874251151E-01)
-
-X( 5) = (  1.85537251555099E+00,  1.87956933523145E+00)
-
-PATH NUMBER =      1803
-
-ARCLEN =  2.38070397601175E+00
-NFE =  380
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93399915274891E-01
-
-X( 1) = (  1.43061398699558E-01,  3.20885308656839E-01)
-X( 2) = (  7.34986435594804E-01,  1.59471155086519E-01)
-X( 3) = ( -6.59063708305710E-01, -7.32943178324255E-01)
-X( 4) = (  4.08038082247691E-01,  1.56873173448313E-01)
-
-X( 5) = (  6.87975532551443E-01,  9.37182614978311E-01)
-
-PATH NUMBER =      1804
-
-ARCLEN =  2.55411574478764E+00
-NFE =  398
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998890808375E-01
-
-X( 1) = ( -5.45803166764977E-01,  1.52812693193742E+00)
-X( 2) = (  9.22203430085325E-01, -3.78152918182560E-02)
-X( 3) = ( -2.18632932150222E-01, -7.71815561274901E-02)
-X( 4) = (  1.43172174192910E-02,  4.73752228798027E-01)
-
-X( 5) = ( -4.13787690220132E-02,  2.75402394960496E-01)
-
-PATH NUMBER =      1805
-
-ARCLEN =  1.93605788618390E+00
-NFE =  338
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999842147E-01
-
-X( 1) = ( -9.46089624706096E+00, -4.05761321820738E-02)
-X( 2) = (  5.41702343317079E-01, -4.83227841515992E-01)
-X( 3) = ( -5.58615620938442E+00, -5.05526283712092E+00)
-X( 4) = (  5.19077068010112E-01,  1.70556832814256E-01)
-
-X( 5) = (  5.10874180058263E-02, -2.14004000965130E-03)
-
-PATH NUMBER =      1806
-
-ARCLEN =  1.78652502203759E+00
-NFE =  264
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999937E-01
-
-X( 1) = (  7.30343817282760E+01,  5.67432697097465E+01)
-X( 2) = (  1.97956232001059E-02,  2.92931395256211E-02)
-X( 3) = (  4.71198197002095E+01,  1.73817263183237E+01)
-X( 4) = (  9.93575772127366E-01,  2.82606030547544E-03)
-
-X( 5) = ( -4.93348043748000E-03,  1.36109072732738E-03)
-
-PATH NUMBER =      1807
-
-ARCLEN =  1.99798941270390E+00
-NFE =  216
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.63723986126245E-07
-
-X( 1) = (  7.03443570322229E+06, -1.19371889539887E+06)
-X( 2) = (  9.51939603744650E-01,  4.62572845026000E-01)
-X( 3) = (  6.31004154781054E+06, -1.25144446137173E+06)
-X( 4) = ( -1.12169025077922E-01, -1.18813866474376E-01)
-
-X( 5) = ( -4.96557708918927E-08, -2.23375267165583E-08)
-
-PATH NUMBER =      1808
-
-ARCLEN =  5.10656279220177E+00
-NFE =  278
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.05136852138743E-09
-
-X( 1) = ( -1.02021959848457E+07,  1.20668355299393E+08)
-X( 2) = ( -1.05831431101059E+08,  4.59025669280592E+06)
-X( 3) = ( -1.38478338127886E+00, -8.31986547499341E-02)
-X( 4) = (  6.34084751566764E-01,  6.49347679391056E-06)
-
-X( 5) = (  5.11893174070101E-09,  9.35161231693229E-09)
-
-PATH NUMBER =      1809
-
-ARCLEN =  4.64735417706369E+00
-NFE =  227
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.87506615583443E-08
-
-X( 1) = ( -9.67350740506531E-01, -1.67489359015583E-01)
-X( 2) = (  5.18927827239334E+07,  8.99482035944024E+07)
-X( 3) = ( -6.18714025947225E+06, -2.01115912500800E+08)
-X( 4) = (  6.34627117478985E-01, -2.90685777763854E-03)
-
-X( 5) = (  1.63558065246865E-09, -6.01209478376516E-09)
-
-PATH NUMBER =      1810
-
-ARCLEN =  1.37511804811813E+00
-NFE =  244
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90950575831689E-01
-
-X( 1) = (  3.77854382389981E-02, -4.57416210469158E-02)
-X( 2) = (  1.05018083785826E+00, -1.46380811643786E-01)
-X( 3) = ( -9.90486858254464E-01, -4.94713060264983E-01)
-X( 4) = (  4.71584257244838E-01, -2.14286837763554E-01)
-
-X( 5) = (  6.98059004149273E-01,  4.70985848161250E-01)
-
-PATH NUMBER =      1811
-
-ARCLEN =  1.37490723137110E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95073562329533E-01
-
-X( 1) = (  3.18689465147687E-02,  2.47622886943673E-01)
-X( 2) = (  8.96740459711137E-01,  9.72657901399867E-02)
-X( 3) = ( -6.78002534705525E-01, -6.60411306371376E-01)
-X( 4) = (  4.97189971944022E-01, -1.15913420074731E-01)
-
-X( 5) = (  5.71761966859276E-01,  7.10450636541336E-01)
-
-PATH NUMBER =      1812
-
-ARCLEN =  1.27970124344996E+00
-NFE =  427
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96450956043377E-01
-
-X( 1) = ( -1.53891354049746E-01,  3.81346078378997E-01)
-X( 2) = (  8.17974477072892E-01,  2.89016752050693E-01)
-X( 3) = ( -5.33758362720826E-01, -5.14309319443806E-01)
-X( 4) = (  6.34561160415324E-01, -1.03130617994581E-01)
-
-X( 5) = (  3.38240255280697E-01,  5.17547541723506E-01)
-
-PATH NUMBER =      1813
-
-ARCLEN =  2.15485995375643E+00
-NFE =  443
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999979131069E-01
-
-X( 1) = ( -1.91329347185589E+00,  4.17655432459322E+00)
-X( 2) = (  1.20900517735557E-01,  2.41166307309115E-02)
-X( 3) = (  7.20328579562781E-01, -1.19928392973891E-01)
-X( 4) = (  7.92558787174371E-01,  1.88965903449163E-01)
-
-X( 5) = ( -9.81505324273766E-03,  1.50017248868186E-01)
-
-PATH NUMBER =      1814
-
-ARCLEN =  1.79332336765229E+00
-NFE =  376
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999896135486E-01
-
-X( 1) = (  6.34313579203567E-01,  7.68113232484327E+00)
-X( 2) = (  8.91315033493853E+00,  5.76691955447050E+00)
-X( 3) = (  2.49980086164267E-02, -3.24648252446369E-02)
-X( 4) = (  1.01449394462862E+00, -5.02708433334374E-02)
-
-X( 5) = ( -1.53091896802147E-02,  4.06900918274833E-02)
-
-PATH NUMBER =      1815
-
-ARCLEN =  2.00965335452037E+00
-NFE =  286
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999985E-01
-
-X( 1) = ( -5.29372535074321E+01,  4.02719350841298E+01)
-X( 2) = ( -4.27410929570314E-01,  3.02112519251608E-03)
-X( 3) = ( -7.77253650718564E+00, -5.15114239399913E-01)
-X( 4) = (  8.74583528355460E-01,  8.91325587500850E-04)
-
-X( 5) = (  5.87592256210624E-03,  8.39312041603460E-03)
-
-PATH NUMBER =      1816
-
-ARCLEN =  1.86370843231311E+00
-NFE =  312
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999908695E-01
-
-X( 1) = ( -4.31097929281824E+00,  8.78129684614880E+00)
-X( 2) = (  5.22056625269511E-01, -4.56931052823918E-01)
-X( 3) = ( -8.24667505786408E+00,  2.45293616145455E+00)
-X( 4) = (  5.23815431010571E-01,  2.02056028422987E-01)
-
-X( 5) = (  2.52977485313782E-02,  3.98859480631330E-02)
-
-PATH NUMBER =      1817
-
-ARCLEN =  2.05751570001752E+00
-NFE =  337
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99829843935467E-01
-
-X( 1) = ( -1.22102134856078E-01,  8.53169274548788E-01)
-X( 2) = (  5.36625386121951E-01,  1.17297348537215E-01)
-X( 3) = ( -3.72188826279267E-01, -4.59042840953643E-01)
-X( 4) = (  8.32355782618242E-01, -3.15391955410654E-01)
-
-X( 5) = (  2.22770860057574E-01,  5.41183827011155E-01)
-
-PATH NUMBER =      1818
-
-ARCLEN =  2.59385164117126E+00
-NFE =  179
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.14750565427833E-09
-
-X( 1) = ( -5.32126059983838E+07, -1.02371557198802E+08)
-X( 2) = (  4.98485331951249E-01, -2.94454322777104E-01)
-X( 3) = (  2.38792635785364E+08,  2.64548854441306E+07)
-X( 4) = (  3.00828139591098E+08,  2.50196864005945E+08)
-
-X( 5) = ( -1.60616775354014E-09, -1.90996815997539E-09)
-
-PATH NUMBER =      1819
-
-ARCLEN =  1.51780576070276E+00
-NFE =  363
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98951698386650E-01
-
-X( 1) = ( -7.97342319067115E-01,  3.85398896239600E-01)
-X( 2) = (  9.18185821962234E-01,  2.98249627686882E-02)
-X( 3) = ( -6.15437300404054E-01, -4.25498315112384E-02)
-X( 4) = (  1.06127338874020E+00, -3.30122792485111E-01)
-
-X( 5) = (  2.41453367132411E-01,  2.85913080252926E-01)
-
-PATH NUMBER =      1820
-
-ARCLEN =  1.56245082933995E+00
-NFE =  429
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99208296433979E-01
-
-X( 1) = ( -2.50196588308246E-01,  2.95518627681616E-02)
-X( 2) = (  6.75590188075273E-01,  3.52954921897942E-01)
-X( 3) = ( -3.17169848940234E-01, -7.22257094680119E-01)
-X( 4) = (  8.69855486873093E-01, -1.33430398947887E-01)
-
-X( 5) = (  7.21163271785164E-01,  3.06608456677749E-01)
-
-PATH NUMBER =      1821
-
-ARCLEN =  1.46872748818891E+00
-NFE =  302
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99232034603060E-01
-
-X( 1) = ( -3.45146271434724E-01,  3.33427963682922E-01)
-X( 2) = (  7.38010425283270E-01,  3.72171943130127E-01)
-X( 3) = ( -4.62936168697873E-02, -3.33409964646320E-01)
-X( 4) = (  8.46750916430768E-01, -2.16021318281180E-01)
-
-X( 5) = (  2.47989085323064E-01,  5.29961850770373E-01)
-
-PATH NUMBER =      1822
-
-ARCLEN =  1.50499831629955E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99994190573967E-01
-
-X( 1) = ( -8.59975439304443E-01,  1.72317186742583E+00)
-X( 2) = (  5.18171437081235E-01,  4.64034141428791E-01)
-X( 3) = ( -1.27480804032532E-02, -2.75132266212538E-01)
-X( 4) = (  9.29948291046346E-01, -1.60327619335332E-01)
-
-X( 5) = (  6.22137889338954E-02,  2.69874640937292E-01)
-
-PATH NUMBER =      1823
-
-ARCLEN =  1.58525488799497E+00
-NFE =  403
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99060162998255E-01
-
-X( 1) = ( -5.80456135879785E-01,  5.52208269752851E-01)
-X( 2) = (  6.29210364797330E-01,  3.28282266029820E-01)
-X( 3) = ( -4.43928538725018E-01, -7.81202706398669E-02)
-X( 4) = (  8.09530026990539E-01, -8.89061237283335E-02)
-
-X( 5) = (  2.07568411448729E-01,  3.21949356018559E-01)
-
-PATH NUMBER =      1824
-
-ARCLEN =  1.45562387355027E+00
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999996974E-01
-
-X( 1) = ( -4.73933075506293E+01, -1.33672715935129E+00)
-X( 2) = ( -5.58967918680714E-02,  4.46375801107995E-02)
-X( 3) = ( -2.54116297384875E+01,  8.33053933896337E+00)
-X( 4) = (  9.91793924370642E-01,  1.25601203460141E-02)
-
-X( 5) = (  9.04197986715163E-03,  3.60761902744604E-03)
-
-PATH NUMBER =      1825
-
-ARCLEN =  1.45923051776231E+00
-NFE =  304
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99601073731334E-01
-
-X( 1) = ( -9.08266946664981E-01,  7.17785198788794E-02)
-X( 2) = (  6.13146986906125E-01,  1.99707250036209E-02)
-X( 3) = ( -5.36931415343622E-01, -6.23867625591019E-02)
-X( 4) = (  9.76314390041217E-01, -5.62280667479329E-02)
-
-X( 5) = (  3.32174603368420E-01,  2.30705116987060E-01)
-
-PATH NUMBER =      1826
-
-ARCLEN =  2.38774167187881E+00
-NFE =  234
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.61990335261363E-07
-
-X( 1) = (  1.08380568386791E+06,  7.50256873231350E+06)
-X( 2) = (  4.50352660448673E-01,  1.38796246274815E-01)
-X( 3) = (  4.03619629654602E+06,  8.96365731678152E+06)
-X( 4) = (  7.34208877259992E-03, -5.97452899571738E-01)
-
-X( 5) = ( -2.04151981242438E-08,  3.65550212787983E-08)
-
-PATH NUMBER =      1827
-
-ARCLEN =  1.79769877552858E+00
-NFE =  354
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99125961115908E-01
-
-X( 1) = (  6.43326503816446E-02, -7.44194417857476E-01)
-X( 2) = (  7.95094075111988E-01, -6.37020632635750E-01)
-X( 3) = ( -1.84204893180344E+00, -2.20484405107478E-01)
-X( 4) = (  5.68759659909235E-01,  7.53607548532466E-02)
-
-X( 5) = (  4.22962032957359E-01, -1.07079514459489E-01)
-
-PATH NUMBER =      1828
-
-ARCLEN =  1.20396612807565E+00
-NFE =  245
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94633993256368E-01
-
-X( 1) = ( -2.66914895798416E-01, -3.45653617744770E-01)
-X( 2) = (  6.54648931736332E-01, -2.57540724402210E-02)
-X( 3) = ( -8.30539938578517E-01,  2.25916266758130E-01)
-X( 4) = (  9.39828879108519E-01, -3.96566711865528E-01)
-
-X( 5) = (  3.99704317394397E-01,  2.15252677574722E-01)
-
-PATH NUMBER =      1829
-
-ARCLEN =  1.27002314828508E+00
-NFE =  349
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97023172228152E-01
-
-X( 1) = ( -1.22362996616130E-01, -4.73425993689961E-02)
-X( 2) = (  7.22689542622317E-01,  2.88111626964731E-01)
-X( 3) = ( -7.02888450087940E-01, -2.80507604875741E-01)
-X( 4) = (  9.78243330323166E-01, -1.06509141248414E-01)
-
-X( 5) = (  5.01193888003956E-01,  2.95980236900158E-01)
-
-PATH NUMBER =      1830
-
-ARCLEN =  3.04421747274746E+00
-NFE =  569
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999806150702E-01
-
-X( 1) = ( -1.05535968897201E+00,  3.31231622524926E+00)
-X( 2) = (  4.14303942774262E-01,  4.82692661453833E-02)
-X( 3) = (  7.98717023250772E-02, -8.58132651479785E-01)
-X( 4) = (  1.20830659988811E+00, -3.86979258150112E-01)
-
-X( 5) = (  3.51588776157551E-03,  2.33632069251993E-01)
-
-PATH NUMBER =      1831
-
-ARCLEN =  1.53003796710289E+00
-NFE =  271
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99379173284415E-01
-
-X( 1) = ( -9.86791394071544E-01,  4.99059244813732E-01)
-X( 2) = ( -1.68911277200951E-01,  2.32033844379101E-01)
-X( 3) = (  7.64050814413458E-01,  2.55942782690337E-01)
-X( 4) = (  8.53986343198670E-01, -4.60445987667730E-02)
-
-X( 5) = (  1.87795763399950E-01,  4.11670390934866E-01)
-
-PATH NUMBER =      1832
-
-ARCLEN =  1.48092239007893E+00
-NFE =  335
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98764429368944E-01
-
-X( 1) = ( -5.76779609970428E-01, -2.52519090431621E-01)
-X( 2) = (  6.50201566613590E-01,  2.87566400962459E-02)
-X( 3) = ( -3.69355503880988E-01,  9.27999054093429E-02)
-X( 4) = (  1.04751676988034E+00,  7.73619968310398E-03)
-
-X( 5) = (  4.59913690770750E-01,  3.04342162782247E-01)
-
-PATH NUMBER =      1833
-
-ARCLEN =  2.18310157622852E+00
-NFE =  376
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999998454025E-01
-
-X( 1) = (  6.16289488839451E+00,  1.73543273761879E+01)
-X( 2) = (  2.21075685133348E+01, -3.76202306192862E+00)
-X( 3) = ( -3.98455546605265E-02, -1.61865550967372E-02)
-X( 4) = (  9.47282513416040E-01, -2.06801214214317E-02)
-
-X( 5) = ( -1.53077166048023E-02,  1.23979601868756E-02)
-
-PATH NUMBER =      1834
-
-ARCLEN =  1.67517243007711E+00
-NFE =  256
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999948E-01
-
-X( 1) = ( -1.02887683918630E+02,  6.35913509109669E+00)
-X( 2) = (  6.18513993657075E-02, -3.00732816995097E-02)
-X( 3) = (  1.33211844304516E+01,  3.74038863856428E+01)
-X( 4) = (  9.95866222926543E-01,  8.00952966109824E-03)
-
-X( 5) = (  4.29764002965676E-03,  4.70609708907142E-03)
-
-PATH NUMBER =      1835
-
-ARCLEN =  1.09414820906489E+00
-NFE =  284
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97886202323018E-01
-
-X( 1) = ( -1.39336567045586E+00, -1.47181450919706E+00)
-X( 2) = ( -1.50882929377359E-02, -6.39897326813148E-02)
-X( 3) = ( -1.57896058199084E+00,  7.45691713866105E-01)
-X( 4) = (  1.00217317555512E+00, -4.99103398367400E-04)
-
-X( 5) = (  1.85993643472784E-01,  1.17354964071855E-02)
-
-PATH NUMBER =      1836
-
-ARCLEN =  2.01741315701316E+00
-NFE =  550
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99805907384130E-01
-
-X( 1) = ( -4.20945554855874E-01, -2.29098158740794E-02)
-X( 2) = (  7.36612671102300E-01, -7.78804402270333E-02)
-X( 3) = ( -1.29159095458098E+00, -2.84895300733181E-01)
-X( 4) = (  6.94871968124205E-01,  5.38784963614636E-01)
-
-X( 5) = (  4.46864701236542E-01,  1.74994127868113E-01)
-
-PATH NUMBER =      1837
-
-ARCLEN =  1.45672277158097E+00
-NFE =  286
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94856922326941E-01
-
-X( 1) = ( -1.93571933771242E-01, -2.50952977685091E-01)
-X( 2) = (  7.24925854894974E-01, -1.45523658185469E-01)
-X( 3) = ( -9.15336094892646E-01, -1.40250095396129E-01)
-X( 4) = (  7.82878524168189E-01, -2.50250243986897E-01)
-
-X( 5) = (  5.29351180972259E-01,  1.96165829849229E-01)
-
-PATH NUMBER =      1838
-
-ARCLEN =  1.69995292892944E+00
-NFE =  193
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.81999517819511E-09
-
-X( 1) = (  2.09385440274045E+08, -5.09046173896388E+07)
-X( 2) = (  4.56225405727531E-01,  2.95172514024227E-01)
-X( 3) = (  2.22998120051790E+08, -3.30628396766900E+08)
-X( 4) = ( -4.98197067835824E+08,  5.84493524297833E+08)
-
-X( 5) = ( -7.89790427502268E-10, -4.40916171900053E-10)
-
-PATH NUMBER =      1839
-
-ARCLEN =  1.47510912932340E+00
-NFE =  356
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98567338165829E-01
-
-X( 1) = ( -1.34992755086150E-01, -2.33849371360044E-01)
-X( 2) = (  5.61383829656935E-01,  1.96412187408942E-01)
-X( 3) = ( -2.60096685347545E-01,  2.36884760325950E-01)
-X( 4) = (  1.02537335111694E+00, -4.55958057346350E-03)
-
-X( 5) = (  4.66291792802701E-01,  5.01881895218663E-01)
-
-PATH NUMBER =      1840
-
-ARCLEN =  1.55162409635630E+00
-NFE =  254
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98723219922917E-01
-
-X( 1) = ( -4.31888680061390E-01,  1.25890675758876E-01)
-X( 2) = (  1.87651656212569E-01,  2.36514860238675E-01)
-X( 3) = (  4.70779134952548E-01,  4.21570068456185E-01)
-X( 4) = (  1.00460692968503E+00,  3.08238603029209E-02)
-
-X( 5) = (  1.67600226204516E-01,  5.55665700149540E-01)
-
-PATH NUMBER =      1841
-
-ARCLEN =  2.29804837915103E+00
-NFE =  374
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999988E-01
-
-X( 1) = (  1.55795109025054E+02, -1.08498783995695E+02)
-X( 2) = (  6.65716755201602E-02,  2.31379902807402E-01)
-X( 3) = (  8.96717349490849E-01, -6.82719228334244E-02)
-X( 4) = ( -8.17242530303694E+01, -1.31547270063962E+00)
-
-X( 5) = ( -2.78963125420228E-03, -3.14756481039042E-03)
-
-PATH NUMBER =      1842
-
-ARCLEN =  1.75344196953488E+00
-NFE =  254
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.99516621377345E-07
-
-X( 1) = ( -5.48621020241951E+05,  7.24962174518592E+05)
-X( 2) = ( -3.39748329063386E+05,  1.78068385066009E+05)
-X( 3) = (  4.12418824911779E-02, -2.25690813802922E-02)
-X( 4) = (  9.62450692851836E-01,  2.28761806669176E-02)
-
-X( 5) = (  4.06617230620099E-07,  6.26737078867820E-07)
-
-PATH NUMBER =      1843
-
-ARCLEN =  2.48921893822661E+00
-NFE =  276
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999940234E-01
-
-X( 1) = ( -7.40285042873910E+00,  1.21021683152075E+00)
-X( 2) = (  5.13270109818752E-01, -2.69176760580225E-01)
-X( 3) = ( -4.41234817843785E-02,  2.52142696106604E-03)
-X( 4) = (  9.69237703513555E-01, -1.92804775544049E-03)
-
-X( 5) = (  7.64929097490800E-02,  5.39375561532009E-02)
-
-PATH NUMBER =      1844
-
-ARCLEN =  1.65975189445266E+00
-NFE =  341
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999988E-01
-
-X( 1) = ( -5.72254580202495E+01, -1.36690419840330E+02)
-X( 2) = ( -6.85194413540306E-02, -1.12642035376068E-02)
-X( 3) = ( -4.96134822068811E+01,  3.75331547783173E+01)
-X( 4) = (  9.94643047210766E-01, -1.56863740791072E-03)
-
-X( 5) = (  4.03178858570012E-03, -1.60413664014726E-03)
-
-PATH NUMBER =      1845
-
-ARCLEN =  1.39129435463459E+00
-NFE =  314
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99830202602447E-01
-
-X( 1) = ( -3.56823868495332E-01, -1.75609175734915E+00)
-X( 2) = ( -4.98461135341790E-02,  5.02271141971892E-02)
-X( 3) = ( -1.22856318663805E+00, -8.10975922226229E-01)
-X( 4) = (  1.00845441826615E+00, -3.86822209897692E-03)
-
-X( 5) = (  1.73496627841389E-01, -1.17488509177062E-01)
-
-PATH NUMBER =      1846
-
-ARCLEN =  2.36908496494055E+00
-NFE =  690
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99927561927879E-01
-
-X( 1) = (  6.83188371415975E-01, -1.24949178096588E+00)
-X( 2) = (  6.22981313693402E-01, -2.64023562210072E-01)
-X( 3) = ( -4.21348051091991E-01, -5.38717636144708E-01)
-X( 4) = (  5.77343170930760E-01,  6.21154428690426E-01)
-
-X( 5) = ( -1.37404333915641E-02, -4.96209952619268E-01)
-
-PATH NUMBER =      1847
-
-ARCLEN =  1.55891744327517E+00
-NFE =  264
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99733694446534E-01
-
-X( 1) = ( -1.68878529883553E-01, -9.18590123323083E-02)
-X( 2) = (  6.35211939744350E-01, -9.32855718031709E-02)
-X( 3) = ( -9.63378221688092E-01, -4.09688354533373E-01)
-X( 4) = (  1.06058629288871E+00, -1.99720994690836E-02)
-
-X( 5) = (  5.80717141566776E-01,  7.03617706980448E-02)
-
-PATH NUMBER =      1848
-
-ARCLEN =  2.51451286709284E+00
-NFE =  243
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999992228E-01
-
-X( 1) = (  8.76540596190684E-04,  3.65040779503727E-02)
-X( 2) = (  1.10697390133539E+00,  1.13922481587342E-01)
-X( 3) = (  8.30300559567079E+00,  1.76650273799240E+01)
-X( 4) = (  1.11614399992633E+01, -4.50868013989957E+01)
-
-X( 5) = (  1.16924918739806E-02,  2.63636243063163E-02)
-
-PATH NUMBER =      1849
-
-ARCLEN =  2.06112457434868E+00
-NFE =  443
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99918619803637E-01
-
-X( 1) = ( -1.64366592328177E+00,  7.82262982216349E-01)
-X( 2) = ( -3.24559570528386E-01,  1.88423439712836E-01)
-X( 3) = (  7.54478356466260E-01, -1.42102555319923E-01)
-X( 4) = (  7.85454313659213E-01,  6.86148136511213E-02)
-
-X( 5) = (  2.40300164517631E-01,  2.95878967407120E-01)
-
-PATH NUMBER =      1850
-
-ARCLEN =  1.58561176159774E+00
-NFE =  470
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99653037685409E-01
-
-X( 1) = ( -1.28155840873668E+00,  6.93838443432238E-01)
-X( 2) = ( -3.14744036113413E-01,  1.29298234416796E-01)
-X( 3) = (  7.69371843998076E-01,  2.32175627152143E-01)
-X( 4) = (  7.79101146145962E-01, -9.71522764589483E-02)
-
-X( 5) = (  1.89127522245527E-01,  3.42363971693347E-01)
-
-PATH NUMBER =      1851
-
-ARCLEN =  3.53971453332976E+00
-NFE =  368
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999987E-01
-
-X( 1) = (  1.99864430745333E+00,  5.98193306003890E+01)
-X( 2) = ( -2.51035755297462E+00,  2.15500089947709E-01)
-X( 3) = ( -3.03178849321539E-01, -3.71977668100774E-02)
-X( 4) = (  8.75879652887358E-01, -4.41732140880470E-03)
-
-X( 5) = ( -5.07551280259329E-03,  1.14841738960361E-02)
-
-PATH NUMBER =      1852
-
-ARCLEN =  2.06453116163631E+00
-NFE =  321
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.20849082919071E-07
-
-X( 1) = ( -1.33625130890177E+06, -7.70153419782139E+05)
-X( 2) = (  5.84092158136614E-02,  1.90928773654960E-01)
-X( 3) = (  4.17899780758391E+05,  2.22611215786034E+06)
-X( 4) = (  9.61174314994396E-01, -6.44258136643275E-02)
-
-X( 5) = (  1.42595703086482E-07,  2.86815489885205E-07)
-
-PATH NUMBER =      1853
-
-ARCLEN =  3.32274562929879E+00
-NFE =  355
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999935E-01
-
-X( 1) = ( -3.68798607650468E-02,  1.45116927620198E-02)
-X( 2) = (  1.13486548871578E+00,  1.20772898768575E-02)
-X( 3) = ( -6.04758493923528E+01, -6.02619971673985E+01)
-X( 4) = (  1.12127154348793E+02,  6.31310757625739E+01)
-
-X( 5) = (  2.71468084012970E-03, -5.04564258520894E-03)
-
-PATH NUMBER =      1854
-
-ARCLEN =  1.94484291924978E+00
-NFE =  294
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99940730142444E-01
-
-X( 1) = ( -1.54257485863292E-01,  3.99745650389875E-01)
-X( 2) = (  5.35998349827329E-01, -3.58976943016007E-01)
-X( 3) = ( -1.33679115467693E+00,  1.96835458704759E-01)
-X( 4) = (  8.65917179519401E-01,  1.39014071914731E-01)
-
-X( 5) = (  3.49210928446342E-01,  3.03586538570446E-01)
-
-PATH NUMBER =      1855
-
-ARCLEN =  2.12844271441155E+00
-NFE =  516
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99982752714245E-01
-
-X( 1) = (  1.46673965990837E+00, -8.52383243603651E-01)
-X( 2) = (  4.66864129810981E-01, -1.90504503168820E-01)
-X( 3) = ( -1.24177923276215E+00, -8.74360138725204E-01)
-X( 4) = (  5.55121960396761E-01,  6.82917235771172E-01)
-
-X( 5) = (  7.16137961483282E-03, -4.14732154018647E-01)
-
-PATH NUMBER =      1856
-
-ARCLEN =  2.17197260484883E+00
-NFE =  197
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.46806179702065E-08
-
-X( 1) = ( -5.52211760163261E-01,  2.11556040414059E-01)
-X( 2) = (  7.94118940186992E-01, -2.11392553769232E-01)
-X( 3) = ( -9.41771162149214E+06,  6.64319996186402E+06)
-X( 4) = (  1.38499793827061E+07, -2.38517150700157E+06)
-
-X( 5) = (  5.56498960181304E-08,  9.43144395633248E-09)
-
-PATH NUMBER =      1857
-
-ARCLEN =  3.23407565832060E+00
-NFE =  411
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.90273454357291E-01
-
-X( 1) = (  1.95369678843750E-01,  2.75764658639676E-01)
-X( 2) = (  6.46882560003878E-01,  1.44633113753443E-01)
-X( 3) = ( -7.02836017426664E-01, -7.63225729000258E-01)
-X( 4) = (  3.83917452436441E-01,  3.13465816926594E-01)
-
-X( 5) = (  1.08092455562103E+00,  9.78140341390770E-01)
-
-PATH NUMBER =      1858
-
-ARCLEN =  2.55779846035177E+00
-NFE =  545
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99978420328405E-01
-
-X( 1) = (  1.60589511831274E+00, -4.71039284006420E-01)
-X( 2) = (  8.28888541627922E-01,  2.15418595835632E-01)
-X( 3) = ( -1.14362006459337E-01,  2.75258382973554E-01)
-X( 4) = ( -4.01951111812577E-01, -9.89077004989884E-01)
-
-X( 5) = ( -4.47305483950995E-01,  3.61454017347383E-01)
-
-PATH NUMBER =      1859
-
-ARCLEN =  5.10601789689634E+00
-NFE =  345
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999934E-01
-
-X( 1) = (  1.15220037424587E+02, -8.70149374490462E+01)
-X( 2) = (  3.47498870363389E-02,  2.70977139576254E-01)
-X( 3) = (  9.95083096131086E-01, -2.21792435071219E-02)
-X( 4) = ( -1.28216217219517E+02, -2.39192441832486E+01)
-
-X( 5) = ( -5.03142971277157E-03, -4.11475584137319E-03)
-
-PATH NUMBER =      1860
-
-ARCLEN =  2.27187157468223E+00
-NFE =  177
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.29830168363971E-09
-
-X( 1) = ( -2.32438049074039E+08,  2.67104437409444E+08)
-X( 2) = (  5.10454822353469E-01, -3.82303202259096E-01)
-X( 3) = ( -4.33071078009770E+08,  8.42600895833041E+08)
-X( 4) = (  1.30369674875889E+09, -2.82086123289814E+08)
-
-X( 5) = (  4.81938873032363E-10,  4.18210353554747E-10)
-
-PATH NUMBER =      1861
-
-ARCLEN =  2.41367655448919E+00
-NFE =  324
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999985E-01
-
-X( 1) = ( -3.62834976066586E-01,  5.74395928728264E-02)
-X( 2) = ( -1.11631868016269E+02,  2.01352967228569E+02)
-X( 3) = ( -1.86752404933113E+00,  4.07999125903567E-01)
-X( 4) = (  8.73676950843313E-01, -2.14311777832063E-03)
-
-X( 5) = (  3.39464874432330E-03,  1.32681024337933E-03)
-
-PATH NUMBER =      1862
-
-ARCLEN =  1.98853050181624E+00
-NFE =  215
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.18988490692441E-10
-
-X( 1) = ( -2.33328531826573E+09,  6.99610255933056E+08)
-X( 2) = (  5.00405591158200E-01, -2.63582844037104E-01)
-X( 3) = ( -1.96526961664758E+09,  3.85264226620500E+09)
-X( 4) = (  4.94747341626184E+09,  3.58882521444016E+08)
-
-X( 5) = (  1.00464683555797E-10,  7.94169503380224E-11)
-
-PATH NUMBER =      1863
-
-ARCLEN =  1.14688164748265E+00
-NFE =  237
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.85842755201448E-01
-
-X( 1) = (  2.60355463360367E-01, -1.36141130122516E+00)
-X( 2) = (  5.54780320548781E-01, -1.98317258842218E-01)
-X( 3) = ( -2.10181209233964E+00, -2.46945322524303E-01)
-X( 4) = (  6.69466330869368E-01,  7.42079492368686E-01)
-
-X( 5) = (  2.73728888266725E-01, -1.40365228936082E-01)
-
-PATH NUMBER =      1864
-
-ARCLEN =  3.43311175369705E+00
-NFE =  367
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999904E-01
-
-X( 1) = (  8.97435614543242E-01, -5.63956069833716E-04)
-X( 2) = ( -2.26628988722370E+02, -3.25991489990840E+02)
-X( 3) = ( -7.27937869747554E-02,  1.20797148392349E-02)
-X( 4) = (  1.78097658341161E+02,  9.74956389998883E+01)
-
-X( 5) = ( -1.27759656579744E-04, -1.69755316014053E-03)
-
-PATH NUMBER =      1865
-
-ARCLEN =  1.92184895706290E+00
-NFE =  224
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.81568494098129E-10
-
-X( 1) = (  9.24214441074756E+08, -6.08951601362274E+08)
-X( 2) = (  5.22652132946008E-01,  3.04571970547118E-01)
-X( 3) = ( -1.66974269198426E+09, -2.20094743371800E+09)
-X( 4) = (  1.67914215903871E+09,  2.56501290227154E+09)
-
-X( 5) = (  2.03766841724504E-11, -1.70811487241844E-10)
-
-PATH NUMBER =      1866
-
-ARCLEN =  2.27780306496279E+00
-NFE =  206
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.55559498253600E-07
-
-X( 1) = (  4.47579033606729E-02,  2.53028124501646E-01)
-X( 2) = (  6.53257187548492E-01, -1.23415545822735E-01)
-X( 3) = (  8.38726591506010E+06,  6.37386543487063E+06)
-X( 4) = ( -5.89961763559920E+06, -1.14109650914311E+07)
-
-X( 5) = ( -2.82141514682129E-08,  5.49289877621335E-08)
-
-PATH NUMBER =      1867
-
-ARCLEN =  3.01069092349920E+00
-NFE =  236
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.60060351424538E-07
-
-X( 1) = (  6.85778932829871E-01,  1.46188036891038E-02)
-X( 2) = (  8.90683213942127E-01, -8.85408100486514E-02)
-X( 3) = (  6.69760748848146E+06,  5.30471561514234E+06)
-X( 4) = ( -4.50753687852500E+06, -9.47946326424352E+06)
-
-X( 5) = ( -3.31457927355819E-08,  6.88884187222561E-08)
-
-PATH NUMBER =      1868
-
-ARCLEN =  3.96026031574499E+00
-NFE =  270
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.35116185699637E-12
-
-X( 1) = (  2.64836214326848E+12, -1.97233359619126E+11)
-X( 2) = (  2.85044858536805E+12,  4.02232255596199E+12)
-X( 3) = (  4.95180610101100E-01,  1.01158016908441E-02)
-X( 4) = ( -1.85570930409736E+12, -5.39607643054582E+12)
-
-X( 5) = ( -9.47215938497392E-15,  1.53249700256264E-13)
-
-PATH NUMBER =      1869
-
-ARCLEN =  3.21658022951602E+00
-NFE =  246
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.29383764289110E-12
-
-X( 1) = ( -3.25476825836813E+11, -2.47834139079456E+11)
-X( 2) = (  1.46130196208697E+11, -6.09689529298539E+11)
-X( 3) = (  5.99034850130203E-01,  3.06383912289059E-02)
-X( 4) = ( -3.80769210033902E+11,  3.27773754243580E+11)
-
-X( 5) = ( -1.02526315345561E-12, -1.46803511187621E-12)
-
-PATH NUMBER =      1870
-
-ARCLEN =  2.52739272628917E+00
-NFE =  287
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.19659675601874E-09
-
-X( 1) = ( -2.35903430817437E+08,  3.97927861580970E+08)
-X( 2) = (  4.23277655269247E-01,  1.70023748184158E-01)
-X( 3) = ( -5.73679702832303E+08,  1.38081529517152E+09)
-X( 4) = (  2.02849831057483E+09, -9.20589899263883E+08)
-
-X( 5) = (  2.89574602496548E-10,  2.76099006450616E-10)
-
-PATH NUMBER =      1871
-
-ARCLEN =  1.58961250177668E+00
-NFE =  424
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97767778083077E-01
-
-X( 1) = (  4.27698030397613E-01,  4.81975952654864E-01)
-X( 2) = (  7.68350127139042E-01,  9.52749517291053E-01)
-X( 3) = (  7.29519517870993E-01, -2.35885656632123E-01)
-X( 4) = ( -1.88656604344447E-01, -4.74734494509263E-01)
-
-X( 5) = ( -1.44547687579300E-01,  3.26771875228983E-01)
-
-PATH NUMBER =      1872
-
-ARCLEN =  2.84847674106292E+00
-NFE =  316
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.70238557854323E-11
-
-X( 1) = (  5.02323782693550E-01, -2.42587353291902E-02)
-X( 2) = ( -1.47548586585758E+11,  3.63462762645459E+10)
-X( 3) = (  3.05639320375629E+10,  1.43465019281439E+11)
-X( 4) = (  2.19251919391598E+10, -1.80730347758051E+11)
-
-X( 5) = (  3.09151909259030E-12,  2.24293684753657E-12)
-
-PATH NUMBER =      1873
-
-ARCLEN =  3.73683060077194E+00
-NFE =  241
-IFLAG2 = 71
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.43611634292990E-06
-
-X( 1) = (  8.28794949256220E-01,  9.19197509693849E-02)
-X( 2) = (  1.45031596177988E+00, -4.35410661468651E-01)
-X( 3) = (  5.50836207639275E+05,  1.30160238160801E+06)
-X( 4) = (  2.75438111465712E-02,  1.71770548409334E-01)
-
-X( 5) = ( -2.23507985582351E-07,  4.64882981358861E-07)
-
-PATH NUMBER =      1874
-
-ARCLEN =  2.16949690509105E+00
-NFE =  473
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.81740541788916E-01
-
-X( 1) = (  7.37743794207122E-01, -2.41182679019304E-02)
-X( 2) = (  5.38622976705591E-01, -1.80090556059625E-01)
-X( 3) = ( -3.67867071995363E-01, -9.89805779105840E-01)
-X( 4) = ( -2.26005200934591E-01,  3.54770071502106E-01)
-
-X( 5) = ( -7.94269357052569E-01, -6.19484183864186E-01)
-
-PATH NUMBER =      1875
-
-ARCLEN =  5.05231861254349E+01
-NFE =  300
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.70854328109990E-01
-
-X( 1) = (  3.29708381257482E-01,  1.43440760217511E-01)
-X( 2) = (  5.01971968773451E-01,  3.75980590796200E-03)
-X( 3) = ( -5.74783562762013E-01, -7.08684568600833E-01)
-X( 4) = (  2.04017516171824E-01,  5.47347678839477E-01)
-
-X( 5) = (  6.03885016261012E+00,  5.79316716985946E+00)
-
-PATH NUMBER =      1876
-
-ARCLEN =  4.24803509507763E+01
-NFE =  582
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.76231822348191E-08
-
-X( 1) = ( -1.26960858470611E-01,  2.25349562458239E-01)
-X( 2) = (  7.19198393840952E-01, -1.00926877616663E-01)
-X( 3) = (  1.17762158558272E+07,  4.53017962572530E+07)
-X( 4) = (  1.97002208960478E+07, -3.15725125674043E+07)
-
-X( 5) = (  8.70402962595621E-10,  1.68290915077227E-08)
-
-PATH NUMBER =      1877
-
-ARCLEN =  1.20374358884500E+02
-NFE =  622
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99991745398427E-01
-
-X( 1) = (  1.61485218860108E-01, -6.26044051458713E+00)
-X( 2) = (  2.85479527916562E+00,  1.32285835619375E+00)
-X( 3) = (  1.92880945690367E+00, -2.59809816393280E-02)
-X( 4) = ( -5.15761026566145E+00, -3.50344144419919E+00)
-
-X( 5) = ( -9.95910744194049E-01, -4.88368502795718E+00)
-
-PATH NUMBER =      1878
-
-ARCLEN =  8.48739729558421E+00
-NFE =  268
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.80052597360453E-11
-
-X( 1) = (  1.17711304522958E+11,  4.48860616357387E+10)
-X( 2) = ( -4.86723278053379E+10,  9.32082228289459E+10)
-X( 3) = (  5.70411943120880E-01,  6.39064772487136E-02)
-X( 4) = (  4.29393631207296E+10, -6.47940810276647E+10)
-
-X( 5) = ( -1.00438669967812E-11,  2.60154537344050E-11)
-
-PATH NUMBER =      1879
-
-ARCLEN =  6.42423730674300E+00
-NFE =  357
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.03994027985428E-08
-
-X( 1) = (  1.07982032235733E+07, -1.36692594627033E+07)
-X( 2) = (  5.15564618658335E-01, -3.20350972081672E-01)
-X( 3) = ( -8.78980124913795E+06,  1.13030002829159E+08)
-X( 4) = (  6.08991688603678E+07, -1.36497578683173E+08)
-
-X( 5) = (  3.33812079155804E-09,  5.17783657892927E-09)
-
-PATH NUMBER =      1880
-
-ARCLEN =  3.53966363244092E+00
-NFE =  308
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.89571095589547E-11
-
-X( 1) = (  4.99558751890322E-01,  8.15093537937584E-03)
-X( 2) = ( -1.10083126906026E+11,  9.04990807871138E+10)
-X( 3) = (  6.68552350868805E+10,  5.35629117366255E+10)
-X( 4) = ( -4.80488603038561E+10, -2.91871157664357E+10)
-
-X( 5) = (  4.68508356567775E-12,  6.36624834880056E-12)
-
-PATH NUMBER =      1881
-
-ARCLEN =  2.22955679817445E+00
-NFE =  313
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99832374883470E-01
-
-X( 1) = (  4.89993431544399E-01, -4.32757072261627E-02)
-X( 2) = (  8.11650752865104E-01, -7.62140359699871E-01)
-X( 3) = ( -5.50868549859610E-01, -1.45069013679207E+00)
-X( 4) = (  3.33956405583885E-01,  5.17674074355083E-01)
-
-X( 5) = ( -2.09632769840508E-01, -4.67255731140573E-01)
-
-PATH NUMBER =      1882
-
-ARCLEN =  5.61997453942957E+00
-NFE =  287
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92155450139342E-01
-
-X( 1) = (  3.12107107274783E-01, -1.95586368641619E-01)
-X( 2) = (  1.14392064480498E+00, -2.37885191457824E-01)
-X( 3) = ( -7.49635502802751E-01, -1.15371223176295E+00)
-X( 4) = (  1.18403104424089E-01,  6.05481932577367E-03)
-
-X( 5) = (  2.97885950857672E-01, -2.04723563993095E+00)
-
-PATH NUMBER =      1883
-
-ARCLEN =  3.23537895801162E+00
-NFE =  298
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.85957293868229E-01
-
-X( 1) = (  4.53463501871611E-01,  8.20558615951575E-02)
-X( 2) = (  7.34726141028228E-01, -7.73887058831060E-02)
-X( 3) = ( -3.89157921505983E-01, -1.05057433332892E+00)
-X( 4) = ( -6.59847284783756E-02,  1.92568303779934E-01)
-
-X( 5) = ( -1.92501134813599E+00, -9.26732306124145E-01)
-
-PATH NUMBER =      1884
-
-ARCLEN =  3.34630426325068E+00
-NFE =  317
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93153256706210E-01
-
-X( 1) = (  1.90849811767705E-01,  3.11270780720447E-01)
-X( 2) = (  6.12117092150277E-01, -1.38710973501394E-02)
-X( 3) = ( -3.07619641010317E-01, -7.90166523692244E-01)
-X( 4) = (  1.29986452587346E-01,  2.99298595573732E-01)
-
-X( 5) = ( -9.23227808052766E-01,  1.98150198711444E+00)
-
-PATH NUMBER =      1885
-
-ARCLEN =  4.52434553269697E+00
-NFE =  406
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998688522394E-01
-
-X( 1) = ( -2.80791168199528E-01,  2.18027437918880E+00)
-X( 2) = (  4.89919452856920E-01, -7.73463195498078E-02)
-X( 3) = ( -1.67298062948489E+00, -1.71517883467804E+00)
-X( 4) = (  9.74343074542793E-01,  8.69504355988010E-01)
-
-X( 5) = (  4.50783717423492E-01,  3.86196223002720E-01)
-
-PATH NUMBER =      1886
-
-ARCLEN =  5.29564458678606E+00
-NFE =  246
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999938E-01
-
-X( 1) = ( -2.20877589053597E+01,  1.02887051450065E+02)
-X( 2) = ( -3.23250189001636E-02,  7.53217471284634E-02)
-X( 3) = (  4.24128533965268E+01, -5.24608914597382E+00)
-X( 4) = (  1.00458454824828E+00,  7.92030347620450E-03)
-
-X( 5) = ( -3.46573619131109E-03,  5.30517128048142E-03)
-
-PATH NUMBER =      1887
-
-ARCLEN =  2.11543075518666E+00
-NFE =  151
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.17396481854664E-11
-
-X( 1) = ( -1.11678978876948E+10,  3.07781610231083E+10)
-X( 2) = ( -1.81737188653645E+10, -1.23841851374771E+09)
-X( 3) = (  4.91476210781931E-01,  1.28696116642904E-02)
-X( 4) = (  5.26402842294486E+09,  4.92258096917754E+09)
-
-X( 5) = (  1.39960725843193E-11,  3.23541850862780E-11)
-
-PATH NUMBER =      1888
-
-ARCLEN =  3.80896839826391E+00
-NFE =  409
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99935383925214E-01
-
-X( 1) = (  9.12514668531755E-01, -4.15048798849168E-01)
-X( 2) = (  1.70430568895195E-01,  4.56566060827716E-01)
-X( 3) = (  9.27818319797828E-01, -4.19932714646599E-02)
-X( 4) = ( -2.85950362734397E-01, -5.27542980077031E-01)
-
-X( 5) = ( -6.21730563303097E-01,  2.67368673698955E-01)
-
-PATH NUMBER =      1889
-
-ARCLEN =  5.86450789044839E+00
-NFE =  457
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999993E-01
-
-X( 1) = (  1.11953809712488E+00, -7.64921848293565E-01)
-X( 2) = ( -5.92148931377456E+01,  1.54100387959322E+02)
-X( 3) = (  8.99920283199770E-01,  1.72644264360507E-01)
-X( 4) = (  2.38968115281500E-02,  6.56302162034121E-02)
-
-X( 5) = (  4.53229406497768E-03,  2.56057769427328E-03)
-
-PATH NUMBER =      1890
-
-ARCLEN =  9.96934677797540E+00
-NFE =  405
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99760434722102E-01
-
-X( 1) = (  3.88835354840729E-01,  2.35981832938194E-01)
-X( 2) = (  1.01770969908829E+00, -3.53484909267008E-01)
-X( 3) = ( -4.20834996253909E-02, -1.44038199792805E+00)
-X( 4) = (  1.49313371089135E-01,  1.46129678537222E-01)
-
-X( 5) = ( -6.19541350517330E-01, -3.30756857397624E-01)
-
-PATH NUMBER =      1891
-
-ARCLEN =  1.82725270152253E+00
-NFE =  264
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.95698176868432E-01
-
-X( 1) = ( -1.33974597619918E-01, -1.90251639701806E-01)
-X( 2) = (  8.98846868301938E-01, -2.22961116830635E-01)
-X( 3) = ( -6.35156248282324E-01, -6.08395050636771E-01)
-X( 4) = (  5.34176347824974E-01, -2.30820318718266E-01)
-
-X( 5) = (  1.05813433177818E+00,  2.18278927404571E-01)
-
-PATH NUMBER =      1892
-
-ARCLEN =  2.62885405930034E+00
-NFE =  252
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.89030809582929E-01
-
-X( 1) = (  1.29273312402120E-01,  1.66253575501648E-01)
-X( 2) = (  7.50051071436015E-01,  1.51241448468065E-02)
-X( 3) = ( -2.34583598447744E-01, -8.45729165858600E-01)
-X( 4) = (  2.19070099222942E-01, -6.89251124213722E-02)
-
-X( 5) = ( -1.04095502784913E-01,  2.72397891060250E+00)
-
-PATH NUMBER =      1893
-
-ARCLEN =  2.19340526170655E+00
-NFE =  241
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97620123754993E-01
-
-X( 1) = ( -6.45137482284190E-03,  4.09146871429526E-01)
-X( 2) = (  6.55171291014165E-01,  7.61968726343027E-02)
-X( 3) = (  5.26574397348978E-02, -8.15512221207057E-01)
-X( 4) = (  2.63302119445168E-01,  5.37616168641884E-02)
-
-X( 5) = ( -5.15159088633469E-01,  1.21527690440895E+00)
-
-PATH NUMBER =      1894
-
-ARCLEN =  2.36706104778211E+00
-NFE =  220
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.36328597211940E-07
-
-X( 1) = (  2.82254707426406E+06, -2.09120399433684E+05)
-X( 2) = ( -3.65227387072015E-02,  1.12591742112901E-01)
-X( 3) = (  1.38951276589796E+06,  2.03480792528388E+06)
-X( 4) = (  9.23559576404627E-01, -7.95234898171700E-02)
-
-X( 5) = ( -1.78288185690247E-07,  2.82495483213590E-08)
-
-PATH NUMBER =      1895
-
-ARCLEN =  2.12498663681485E+00
-NFE =  338
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99537013897692E-01
-
-X( 1) = ( -8.19289759656598E-01, -6.40051179066142E-01)
-X( 2) = (  7.40598672351144E-01, -4.31866343052104E-01)
-X( 3) = ( -6.17864869701045E-01, -3.73716929417858E-01)
-X( 4) = (  6.34739281120248E-01,  6.78031158833343E-02)
-
-X( 5) = (  5.43173952338441E-01, -3.54562808245106E-02)
-
-PATH NUMBER =      1896
-
-ARCLEN =  2.01797434015251E+00
-NFE =  296
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999992E-01
-
-X( 1) = ( -4.88681155613251E+01,  4.48425443347281E+01)
-X( 2) = ( -2.53351794936998E+00,  2.94883243474492E-01)
-X( 3) = ( -3.02852575316177E-01, -4.29145515193777E-02)
-X( 4) = (  8.76169929445822E-01, -5.46369314975017E-03)
-
-X( 5) = (  4.79148812603551E-03,  9.81226964780615E-03)
-
-PATH NUMBER =      1897
-
-ARCLEN =  2.07244953841131E+00
-NFE =  240
-IFLAG2 = 41
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.95059782113351E-09
-
-X( 1) = ( -1.89023658135725E+07,  8.08753437868620E+06)
-X( 2) = ( -9.04776766726594E+06, -2.57245766675662E+06)
-X( 3) = ( -1.93469784294670E-01,  5.79383432143605E-01)
-X( 4) = (  7.28895969610700E-01,  1.71979663469884E-01)
-
-X( 5) = (  3.24952499223326E-08,  1.47011524091940E-08)
-
-PATH NUMBER =      1898
-
-ARCLEN =  8.35144347862672E+00
-NFE =  190
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.75147198992692E-13
-
-X( 1) = ( -1.28639693637354E+11,  6.72298691636124E+11)
-X( 2) = ( -1.34525472709371E+12,  1.05726500668352E+11)
-X( 3) = (  4.88130692745589E-01, -2.83110215877869E-03)
-X( 4) = ( -5.36986053060627E+11,  1.35175200931288E+11)
-
-X( 5) = (  1.06027396606402E-12,  3.11383839719792E-13)
-
-PATH NUMBER =      1899
-
-ARCLEN =  9.03548426828563E+00
-NFE =  418
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99670120995942E-01
-
-X( 1) = ( -4.19777356257932E-02,  3.55466286146672E-01)
-X( 2) = (  8.18433444149114E-01, -1.94660457490191E-01)
-X( 3) = (  2.32461560693292E-01, -1.05470028291134E+00)
-X( 4) = (  3.72516177098841E-01, -2.11309272626902E-01)
-
-X( 5) = ( -1.43840913517026E+00,  4.56610642244982E-01)
-
-PATH NUMBER =      1900
-
-ARCLEN =  1.30758485210109E+00
-NFE =  324
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98226798507785E-01
-
-X( 1) = ( -3.42835095133618E-01, -2.88729673890980E-01)
-X( 2) = (  6.73689084333150E-01, -1.24440698467919E-01)
-X( 3) = ( -6.56350499133779E-01, -3.61924538510283E-01)
-X( 4) = (  8.51910636872302E-01, -3.14982969898356E-01)
-
-X( 5) = (  5.89497647071586E-01,  1.04431744813597E-01)
-
-PATH NUMBER =      1901
-
-ARCLEN =  1.32531916033266E+00
-NFE =  238
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.94938573621076E-01
-
-X( 1) = ( -1.47397935036810E-01, -9.29451382032195E-03)
-X( 2) = (  7.35922458862761E-01,  9.99992189844331E-02)
-X( 3) = ( -2.71441177223679E-01, -5.72294847371683E-01)
-X( 4) = (  6.14555111480185E-01, -1.15503386338974E-01)
-
-X( 5) = (  8.99330522336175E-01,  7.28067771172708E-01)
-
-PATH NUMBER =      1902
-
-ARCLEN =  1.73636047947580E+00
-NFE =  283
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98611806948378E-01
-
-X( 1) = ( -3.55837591284671E-01,  5.45632305385138E-01)
-X( 2) = (  5.33308745586318E-01,  3.37384607326516E-01)
-X( 3) = (  2.56628859089948E-01, -7.64657597198987E-01)
-X( 4) = (  6.24370954105960E-01, -8.67165143466159E-02)
-
-X( 5) = (  2.02679485293429E-01,  8.53356332133970E-01)
-
-PATH NUMBER =      1903
-
-ARCLEN =  1.72512406439030E+00
-NFE =  372
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972936972212E-01
-
-X( 1) = ( -7.90686483686857E-01,  1.11637361333098E+00)
-X( 2) = (  5.67509207746091E-01,  4.29902559566554E-01)
-X( 3) = (  2.09331218500226E-03, -2.83911173608109E-01)
-X( 4) = (  8.94986684610827E-01, -1.91597484495653E-01)
-
-X( 5) = (  1.15789321692245E-01,  3.23998190688488E-01)
-
-PATH NUMBER =      1904
-
-ARCLEN =  1.62975072795224E+00
-NFE =  307
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99984756805523E-01
-
-X( 1) = ( -2.12179395331922E+00,  8.71170024747129E-01)
-X( 2) = ( -4.30524963055290E-01, -3.34609510578735E-01)
-X( 3) = (  6.44227468908919E-01,  1.46465867730428E-01)
-X( 4) = (  8.51446237504453E-01, -1.28947398514558E-01)
-
-X( 5) = (  2.18845982415705E-01,  2.30596894702947E-01)
-
-PATH NUMBER =      1905
-
-ARCLEN =  2.03155277321031E+00
-NFE =  265
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999990E-01
-
-X( 1) = ( -6.30116592828002E+01, -7.23371540644394E+00)
-X( 2) = ( -2.52203811248143E+00,  3.60004346993171E-01)
-X( 3) = ( -3.05616451152150E-01, -4.66516673728223E-02)
-X( 4) = (  8.75588880760654E-01, -6.42943337748129E-03)
-
-X( 5) = (  1.06447735270782E-02,  3.02459107209601E-03)
-
-PATH NUMBER =      1906
-
-ARCLEN =  2.93761059674747E+00
-NFE =  419
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99998764880091E-01
-
-X( 1) = ( -1.83433594954733E+00,  1.24121157290753E+00)
-X( 2) = (  5.15723063805513E-01, -1.92633966872446E-01)
-X( 3) = ( -6.81804157933492E-03, -9.40818302436610E-01)
-X( 4) = (  7.76948454029547E-01,  5.22043008497523E-01)
-
-X( 5) = (  2.63442732501821E-01,  3.36201883374595E-01)
-
-PATH NUMBER =      1907
-
-ARCLEN =  3.00549432622089E+00
-NFE =  296
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99801920037530E-01
-
-X( 1) = ( -6.47377771099658E-01,  6.29033323053837E-01)
-X( 2) = (  4.08826138966009E-01,  1.16824665009145E-01)
-X( 3) = (  4.47312592406500E-01, -7.85401707973978E-01)
-X( 4) = (  9.55643708354628E-01, -2.95878857724463E-01)
-
-X( 5) = (  4.40417162604055E-01,  8.59519245376495E-01)
-
-PATH NUMBER =      1908
-
-ARCLEN =  2.03349857666989E+00
-NFE =  176
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.73960977157970E-10
-
-X( 1) = ( -1.79181016472525E+07,  9.12360836830635E+07)
-X( 2) = (  5.00930402054696E-01, -2.93127320592473E-01)
-X( 3) = ( -4.35445016895029E+07,  1.10530389070974E+08)
-X( 4) = ( -9.56720005254856E+07,  2.03357100872621E+05)
-
-X( 5) = ( -1.40993136220000E-11,  3.02961172604166E-09)
-
-PATH NUMBER =      1909
-
-ARCLEN =  1.72822471957867E+00
-NFE =  403
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99065930781225E-01
-
-X( 1) = ( -1.83402013142778E-01, -3.62102475540945E-01)
-X( 2) = (  5.29791650755926E-01, -4.99504121137358E-01)
-X( 3) = ( -6.51556156716757E-01, -3.71783274741692E-01)
-X( 4) = (  8.32436696644469E-01,  4.23796580732705E-02)
-
-X( 5) = (  7.69265405018985E-01, -2.96423992659275E-01)
-
-PATH NUMBER =      1910
-
-ARCLEN =  1.64746480188175E+00
-NFE =  530
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98880746586961E-01
-
-X( 1) = ( -2.93672399548947E-01, -3.27175045625067E-01)
-X( 2) = (  5.05705642729381E-01,  5.44005110994908E-04)
-X( 3) = ( -1.48977979445823E-01, -2.82788670855276E-01)
-X( 4) = (  1.01078500995679E+00,  1.29877611988175E-03)
-
-X( 5) = (  9.66447385268547E-01,  1.02075578899544E-01)
-
-PATH NUMBER =      1911
-
-ARCLEN =  1.80507359990477E+00
-NFE =  440
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98820845718043E-01
-
-X( 1) = ( -3.48947208852645E-01, -2.44133312141031E-02)
-X( 2) = (  5.05388431724299E-01,  2.92421232949856E-01)
-X( 3) = (  8.69761918591259E-03, -3.48831974226005E-01)
-X( 4) = (  1.01424119470367E+00, -2.38882527819214E-02)
-
-X( 5) = (  6.91593778215841E-01,  5.02366501606485E-01)
-
-PATH NUMBER =      1912
-
-ARCLEN =  3.46643687560419E+00
-NFE =  314
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.56856301849348E-07
-
-X( 1) = (  2.57227279793379E+06,  4.28089987897322E+06)
-X( 2) = (  6.96187415636838E-02, -7.63855057013701E-02)
-X( 3) = (  4.78691543578441E+06,  2.86845228302866E+06)
-X( 4) = (  9.80199417892310E-01, -2.15590227961696E-03)
-
-X( 5) = ( -5.88255859017717E-08,  3.60482708649233E-08)
-
-PATH NUMBER =      1913
-
-ARCLEN =  1.37414250848150E+00
-NFE =  288
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99949028503321E-01
-
-X( 1) = ( -1.60207329014560E+00,  7.35083179130444E-01)
-X( 2) = ( -3.12636674203232E-01,  2.84129950380354E-01)
-X( 3) = (  6.64013016088756E-01, -5.13221048307762E-02)
-X( 4) = (  9.03540453988929E-01,  1.03300661455181E-01)
-
-X( 5) = (  2.34723622065139E-01,  2.71797953039270E-01)
-
-PATH NUMBER =      1914
-
-ARCLEN =  2.07380304854866E+00
-NFE =  595
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999888477668E-01
-
-X( 1) = ( -6.34720632124478E+00, -1.08707050975230E-01)
-X( 2) = ( -3.50403641701572E+00,  1.31526611814146E+00)
-X( 3) = (  5.75944050113615E-01,  2.51041614105452E-01)
-X( 4) = (  5.72001871030360E-01, -2.18067064135472E-01)
-
-X( 5) = (  7.81375030465985E-02,  1.87552835677146E-02)
-
-PATH NUMBER =      1915
-
-ARCLEN =  1.99412179014072E+00
-NFE =  261
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999547543E-01
-
-X( 1) = ( -3.61023033645503E+01,  5.94516744136183E+00)
-X( 2) = ( -1.62829939759233E+01,  1.68351960092589E+01)
-X( 3) = (  3.81772499816108E-02, -5.26596008422924E-03)
-X( 4) = (  1.03795776129582E+00, -7.58844883525858E-03)
-
-X( 5) = (  1.19438778758952E-02,  5.25888729568508E-03)
-
-PATH NUMBER =      1916
-
-ARCLEN =  4.22644541902648E+00
-NFE =  494
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99473273336542E-01
-
-X( 1) = ( -4.43066967144047E-01,  1.85166352228403E-01)
-X( 2) = (  3.03462008969245E-02,  3.27421340419859E-01)
-X( 3) = (  6.67211163143709E-01, -3.73917588003945E-01)
-X( 4) = (  9.90621890285266E-01,  2.31038623663433E-02)
-
-X( 5) = (  8.07694608671476E-01,  1.02805475821324E+00)
-
-PATH NUMBER =      1917
-
-ARCLEN =  2.49984112990748E+00
-NFE =  252
-IFLAG2 = 51
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.18207779454110E-07
-
-X( 1) = (  1.49866052846175E+06,  3.95778657230043E+05)
-X( 2) = (  3.90043488378002E-02, -1.41755375570347E-01)
-X( 3) = (  5.81638365664849E+05,  1.19167938736679E+06)
-X( 4) = (  9.17620490661257E-01,  7.18252856973692E-02)
-
-X( 5) = ( -2.84649703982453E-07,  1.20411418807922E-07)
-
-PATH NUMBER =      1918
-
-ARCLEN =  2.19274224229131E+00
-NFE =  182
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.52391272881393E-10
-
-X( 1) = (  2.20948211086707E+08, -1.35814836412614E+09)
-X( 2) = (  4.15046598831489E-01, -4.44926368487284E-01)
-X( 3) = (  1.42264088667953E+07, -1.47091311657576E+09)
-X( 4) = (  2.26776316634023E+09,  1.46259130000304E+09)
-
-X( 5) = (  1.27679858602080E-11, -1.82511125028199E-10)
-
-PATH NUMBER =      1919
-
-ARCLEN =  2.18908833376910E+00
-NFE =  397
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99877969162243E-01
-
-X( 1) = ( -2.81997105433986E-01, -1.68642355942525E-01)
-X( 2) = (  5.33319177199077E-01, -1.09978758338725E-01)
-X( 3) = ( -2.28991008751965E-01, -7.17041131297190E-01)
-X( 4) = (  1.02893934920752E+00,  7.46530707747521E-02)
-
-X( 5) = (  9.18354887821254E-01, -3.98203904768559E-01)
-
-PATH NUMBER =      1920
-
-ARCLEN =  2.61201721138871E+00
-NFE =  277
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99761377616034E-01
-
-X( 1) = ( -3.86482559612036E-01,  3.82709581009274E-01)
-X( 2) = (  4.52465268233282E-01,  2.69685200124928E-01)
-X( 3) = (  1.35148536254545E-01, -8.36333259041675E-01)
-X( 4) = (  9.68985457348596E-01, -4.93334468255560E-02)
-
-X( 5) = (  9.42101121911768E-01,  7.36660387615876E-01)
-
-PATH NUMBER =      1921
-
-ARCLEN =  1.72289844025195E+00
-NFE =  282
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99526396153380E-01
-
-X( 1) = ( -8.32687961335088E-01,  2.96747890579667E-01)
-X( 2) = ( -7.66576936128496E-02,  3.83586376177247E-01)
-X( 3) = (  6.32879014711044E-01, -1.86371189248081E-02)
-X( 4) = (  1.03102488632822E+00,  1.10653895734500E-01)
-
-X( 5) = (  3.49515177368285E-01,  4.66925409756781E-01)
-
-PATH NUMBER =      1922
-
-ARCLEN =  1.40369218506279E+00
-NFE =  344
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93511053405924E-01
-
-X( 1) = ( -9.50839971800081E-01,  4.85769527218225E-01)
-X( 2) = ( -9.87149038325126E-01,  4.91725294557599E-01)
-X( 3) = (  6.53239245467398E-01, -1.02897666504408E-01)
-X( 4) = (  7.74958093768751E-01,  2.01796040706393E-01)
-
-X( 5) = (  4.03328015205295E-01,  2.38761911361655E-01)
-
-PATH NUMBER =      1923
-
-ARCLEN =  1.46105405796179E+00
-NFE =   94
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.11582805031174E-14
-
-X( 1) = ( -9.77444898345638E+13, -1.14378459021579E+14)
-X( 2) = ( -1.29886908612357E+14, -7.00248597158330E+12)
-X( 3) = (  7.16538696519607E-01, -3.75022976338165E-01)
-X( 4) = (  2.28439075908602E+13,  9.84562838530447E+13)
-
-X( 5) = (  2.14766897842222E-15, -1.97530793805134E-15)
-
-PATH NUMBER =      1924
-
-ARCLEN =  2.06807064366094E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.97683724393840E-01
-
-X( 1) = ( -7.56582132583855E-01, -1.33730667570707E-01)
-X( 2) = (  1.13456969556252E-01, -4.25165297265857E-01)
-X( 3) = (  6.05101634477725E-01,  7.14629540165260E-01)
-X( 4) = (  8.32428001105715E-01, -3.63646485246928E-02)
-
-X( 5) = (  2.04471937188002E-01,  6.78112081726196E-01)
-
-PATH NUMBER =      1925
-
-ARCLEN =  1.79990157287540E+00
-NFE =  176
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.14873319452126E-12
-
-X( 1) = ( -7.11630044793195E+10,  6.70694866617666E+09)
-X( 2) = (  5.58200839746932E-01,  2.59249690285841E-01)
-X( 3) = (  3.39047015768747E+10,  1.05728488622556E+11)
-X( 4) = (  1.41670185548544E+10, -4.04092802570479E+10)
-
-X( 5) = (  1.41245961324601E-12,  4.73680101219232E-12)
-
-PATH NUMBER =      1926
-
-ARCLEN =  2.15639291510679E+00
-NFE =  381
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99988400511786E-01
-
-X( 1) = (  7.20196803784183E-01, -8.41536836637255E-01)
-X( 2) = (  4.78302355809413E-01, -3.50947367921067E-01)
-X( 3) = ( -1.57723211072571E-01, -1.57763416569782E+00)
-X( 4) = (  5.51575846388534E-01,  6.58408616404524E-01)
-
-X( 5) = ( -5.69742459520073E-02, -3.07390445180558E-01)
-
-PATH NUMBER =      1927
-
-ARCLEN =  1.76018598777217E+00
-NFE =  410
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99995642825007E-01
-
-X( 1) = (  1.06712354658530E+00, -4.36132395629513E-01)
-X( 2) = (  3.18382603578153E-01, -2.60551612249648E-01)
-X( 3) = ( -1.07931892186356E+00, -2.17812647510994E+00)
-X( 4) = (  5.73545867467031E-01,  6.34928876446967E-01)
-
-X( 5) = (  2.17180771974197E-02, -2.73485580358285E-01)
-
-PATH NUMBER =      1928
-
-ARCLEN =  2.23092821463156E+00
-NFE =  279
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.92114471576857E-01
-
-X( 1) = (  1.72863451818780E-01, -6.47445691174899E-01)
-X( 2) = (  6.37632635434104E-01, -2.10647233376380E-01)
-X( 3) = ( -6.66271162758643E-01, -1.06470571236839E-02)
-X( 4) = (  7.65593654298477E-01,  4.57211446900177E-01)
-
-X( 5) = (  1.26244201513661E+00, -4.05852828358649E-01)
-
-PATH NUMBER =      1929
-
-ARCLEN =  2.41691585062962E+00
-NFE =  277
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999532023E-01
-
-X( 1) = (  3.54845339140100E+00,  3.78794868765714E+00)
-X( 2) = (  4.77318606718560E-01,  5.15394968535476E-01)
-X( 3) = (  4.96211360472733E-01, -1.84059555202598E-01)
-X( 4) = ( -1.01568537021106E+01, -1.15229855094624E+01)
-
-X( 5) = ( -1.96035567162619E-02,  7.31374843808320E-02)
-
-PATH NUMBER =      1930
-
-ARCLEN =  1.52521250679322E+00
-NFE =  124
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.31682233114519E-13
-
-X( 1) = ( -1.29063293028836E+12,  2.63975837331804E+12)
-X( 2) = (  2.34748317251477E+11,  2.58437638464599E+12)
-X( 3) = (  4.97425203192556E-01, -3.22713101845903E-03)
-X( 4) = (  4.11771704572562E+12, -2.91054280576271E+12)
-
-X( 5) = (  9.66782535104238E-14,  1.09185230301456E-13)
-
-PATH NUMBER =      1931
-
-ARCLEN =  1.45923719512494E+00
-NFE =   86
-IFLAG2 = 21
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.26111878491128E-14
-
-X( 1) = (  7.18412294315416E+12, -2.88169455217435E+12)
-X( 2) = (  4.30015475927565E+12, -7.53550525077143E+12)
-X( 3) = (  4.94571453708807E-01, -1.13633883611751E-03)
-X( 4) = ( -9.71328896815870E+12, -2.04215898946567E+12)
-
-X( 5) = ( -4.97175271872013E-14, -1.46961436076065E-14)
-
-PATH NUMBER =      1932
-
-ARCLEN =  1.86230231282299E+00
-NFE =  288
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99972610209844E-01
-
-X( 1) = ( -2.39596291071297E+00,  3.11855842458663E-01)
-X( 2) = ( -4.46182043515152E+00,  2.28327686834215E+00)
-X( 3) = (  5.81128862896907E-01, -1.98172675673674E-01)
-X( 4) = (  5.96596995641767E-01,  2.42558712902864E-01)
-
-X( 5) = (  1.20158457067471E-01,  9.37331044744927E-03)
-
-PATH NUMBER =      1933
-
-ARCLEN =  3.25334370667376E+00
-NFE =  450
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98572621109512E-01
-
-X( 1) = (  8.55221643998966E-03, -3.94201356259345E-01)
-X( 2) = (  6.56450859930481E-01, -2.20821155383618E-01)
-X( 3) = ( -4.11445261599099E-01,  4.51736518799426E-01)
-X( 4) = (  9.42318395546547E-01,  4.56433173178847E-01)
-
-X( 5) = (  6.27256081804769E-01,  1.03561230666592E+00)
-
-PATH NUMBER =      1934
-
-ARCLEN =  2.02555623876245E+00
-NFE =  398
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96547416418722E-01
-
-X( 1) = (  8.34901829760940E-01, -2.35365493353988E-01)
-X( 2) = (  6.45957314141247E-01,  2.60305934495845E-01)
-X( 3) = (  2.67656819030537E-01, -5.21010065060710E-01)
-X( 4) = ( -2.28202792779716E-01,  1.03313080064577E-01)
-
-X( 5) = ( -7.36129899500877E-01,  1.21410769566132E-01)
-
-PATH NUMBER =      1935
-
-ARCLEN =  2.41829179952278E+00
-NFE =  709
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999995231833E-01
-
-X( 1) = (  2.42991805704070E+00, -1.91936530053520E+00)
-X( 2) = (  4.66275488782037E-01, -5.51746784235866E-01)
-X( 3) = ( -1.40235868140634E+00, -7.03871543495379E+00)
-X( 4) = (  4.64855499139698E-01,  1.38208543265245E-01)
-
-X( 5) = (  2.60150839191239E-04, -7.77898919304375E-02)
-
-PATH NUMBER =      1936
-
-ARCLEN =  2.37291820977946E+00
-NFE =  323
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.98997228140983E-01
-
-X( 1) = ( -2.22000778409473E-01, -5.07995896718575E-01)
-X( 2) = (  7.77852152250063E-01, -6.56870920520499E-01)
-X( 3) = ( -4.64246866273851E-01, -4.67324567144728E-01)
-X( 4) = (  6.92787372398254E-01,  1.52213032197474E-02)
-
-X( 5) = (  8.10866390262601E-01, -7.73595015724780E-01)
-
-PATH NUMBER =      1937
-
-ARCLEN =  2.80375671033321E+00
-NFE =  311
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.93161090025470E-01
-
-X( 1) = (  3.43423474202165E-03, -1.66794989578333E-01)
-X( 2) = (  6.91914134302048E-01,  3.50737229304693E-02)
-X( 3) = ( -5.13120833177968E-01, -6.43665109569380E-01)
-X( 4) = (  6.16464800892022E-01,  1.61304801757267E-01)
-
-X( 5) = (  1.33478839000372E+00,  2.28088796534203E-02)
-
-PATH NUMBER =      1938
-
-ARCLEN =  2.83127807151640E+00
-NFE =  396
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.96746624248329E-01
-
-X( 1) = (  1.10166840220684E-01, -2.62222425042215E-01)
-X( 2) = (  6.78217386115310E-01, -2.13016827433883E-01)
-X( 3) = ( -6.82468713308351E-01,  3.94507162377001E-01)
-X( 4) = (  7.42189267564085E-01,  4.91521687389022E-01)
-
-X( 5) = (  4.98714246290138E-01,  8.47821588221943E-01)
-
-PATH NUMBER =      1939
-
-ARCLEN =  1.05742139172061E+01
-NFE =  460
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99806826340855E-01
-
-X( 1) = ( -5.34039954702712E-02, -1.37260424829456E-01)
-X( 2) = ( -3.50600118774146E-01, -2.69810161854432E-01)
-X( 3) = (  9.08798864863838E-01,  2.47723536542845E-03)
-X( 4) = (  6.64625741003980E-01,  9.57732984849499E-01)
-
-X( 5) = ( -9.19686898104165E-01, -4.40546783664749E-01)
-
-PATH NUMBER =      1940
-
-ARCLEN =  5.17525434238764E+00
-NFE =  263
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.29830046959433E-11
-
-X( 1) = (  6.08019688793804E+10, -1.39100237588932E+11)
-X( 2) = (  3.38404345173806E-01,  3.53858581967631E-01)
-X( 3) = ( -3.57391856168678E+11, -1.83859892900826E+11)
-X( 4) = ( -1.60220716678771E+11,  1.69623030068432E+11)
-
-X( 5) = (  1.25527200938412E-12, -1.35232227976498E-12)
-
-PATH NUMBER =      1941
-
-ARCLEN =  2.43665261771121E+00
-NFE =  184
-IFLAG2 = 31
-COMPLEX, INFINITE SOLUTION
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.15818683719952E-09
-
-X( 1) = (  1.00372775407408E+08,  1.13450766663701E+08)
-X( 2) = (  5.27952321709693E-01, -2.98041728067802E-01)
-X( 3) = (  3.33497755851210E+08,  1.25762477371052E+08)
-X( 4) = ( -3.41544741226148E+08, -5.08583677973537E+08)
-
-X( 5) = ( -8.86739363957067E-10,  1.04037075514870E-09)
-
-PATH NUMBER =      1942
-
-ARCLEN =  6.80942072206887E+00
-NFE =  332
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999977724E-01
-
-X( 1) = (  5.77110804785550E+01, -2.90195349168754E+00)
-X( 2) = ( -1.59950757147822E+01,  7.86940772969281E+01)
-X( 3) = (  8.93938287140303E-01, -2.32611398690324E-03)
-X( 4) = ( -1.45757491901802E-01, -2.28589768516527E-02)
-
-X( 5) = (  2.75833890929743E-03,  4.07314437778486E-02)
-
-PATH NUMBER =      1943
-
-ARCLEN =  2.16882045561302E+00
-NFE =  384
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99933792543553E-01
-
-X( 1) = ( -1.13973471831038E+00, -5.86002887391766E-01)
-X( 2) = (  6.06564704683244E-01, -4.83158937728862E-01)
-X( 3) = ( -2.03829631937828E-01, -4.66544921016580E-02)
-X( 4) = (  8.22887985245605E-01,  5.55807824137665E-02)
-
-X( 5) = (  5.52544806760528E-01,  9.52735262917526E-02)
-
-PATH NUMBER =      1944
-
-ARCLEN =  5.86091704556933E+00
-NFE =  322
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999961E-01
-
-X( 1) = ( -2.52222753513976E+02, -1.21708537125695E+02)
-X( 2) = (  3.89398815140703E+02, -4.80942500762180E+02)
-X( 3) = (  8.50061484121132E-02, -1.76203360421051E-02)
-X( 4) = (  9.11052281402825E-01, -1.62352007532975E-03)
-
-X( 5) = ( -2.48955653044373E-03, -1.18599258955869E-03)
-
-PATH NUMBER =      1945
-
-ARCLEN =  2.92255328687243E+00
-NFE =  285
-IFLAG2 =  7
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999825E-01
-
-X( 1) = (  5.28315453449834E-01, -3.50026152527377E-01)
-X( 2) = (  6.77000102135279E+02, -6.76610213686841E+02)
-X( 3) = (  6.71880938283159E-01,  5.77316374771274E-01)
-X( 4) = (  9.70470871509754E+01,  2.36119797159675E+02)
-
-X( 5) = ( -7.93628882529342E-04, -1.42494620859324E-04)
-
-PATH NUMBER =      1946
-
-ARCLEN =  2.50337146315815E+00
-NFE =  280
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  9.99999999999966E-01
-
-X( 1) = (  2.67189214339780E-01, -2.65710066268281E-02)
-X( 2) = (  4.06812370793475E+02, -9.60297975502631E+02)
-X( 3) = (  1.26591378206654E+00, -2.02033624052986E-02)
-X( 4) = (  3.15652893635475E+02,  4.48630590640249E+02)
-
-X( 5) = ( -5.46895806251887E-04, -3.74761315549035E-04)
-
-PATH NUMBER =      1947
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.49376228125428E-01, -7.09060353363254E-02)
-X( 2) = ( -3.89532605909850E-03, -1.80719738057172E-01)
-X( 3) = (  3.06903751794858E-02, -8.14350481071898E-01)
-X( 4) = ( -2.06326254467415E-02,  7.69815800498987E-01)
-
-X( 5) = ( -5.03348516688240E-01, -7.40501498073736E-01)
-
-PATH NUMBER =      1948
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.62060563757474E-01,  9.73266108561850E-02)
-X( 2) = ( -4.05248713982403E-01, -1.31338975088510E-01)
-X( 3) = (  3.01274332590265E-01, -6.06511983350345E-01)
-X( 4) = ( -9.27663721794968E-02,  8.20564892754988E-01)
-
-X( 5) = ( -9.30766513129674E-01, -1.23156844018353E+00)
-
-PATH NUMBER =      1949
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.66173864869959E-01,  4.15173454985818E-02)
-X( 2) = ( -7.44444589121150E-01, -3.51496100882207E-01)
-X( 3) = (  3.74957658410657E-01, -2.73370441900953E-01)
-X( 4) = ( -1.80644915730472E-01,  8.13074274230948E-01)
-
-X( 5) = (  4.03433219670070E-01, -2.73665645337298E+00)
-
-PATH NUMBER =      1950
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.81742520682761E-01, -2.12220055897418E-01)
-X( 2) = ( -8.62769431755677E-01, -7.38177149505482E-01)
-X( 3) = (  2.17263105590349E-01,  2.91935135762873E-02)
-X( 4) = ( -2.43148908910944E-01,  7.50848888583217E-01)
-
-X( 5) = (  9.59058298321493E-01, -1.00956723069354E+00)
-
-PATH NUMBER =      1951
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.83778433847378E-01, -5.45159043241524E-01)
-X( 2) = ( -7.04857732983144E-01, -1.11044976082635E+00)
-X( 3) = ( -9.80222920262997E-02,  1.59606845689772E-01)
-X( 4) = ( -2.51032038657263E-01,  6.63004685314497E-01)
-
-X( 5) = (  5.22255381843537E-01, -6.66566170278702E-01)
-
-PATH NUMBER =      1952
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.71328977967430E-01, -8.01513764150750E-01)
-X( 2) = ( -3.44598131652263E-01, -1.29412344265855E+00)
-X( 3) = ( -4.23372992887575E-01,  5.68477069608617E-02)
-X( 4) = ( -2.00605700949898E-01,  5.90644943413796E-01)
-
-X( 5) = (  2.73560398783774E-01, -5.91276688136632E-01)
-
-PATH NUMBER =      1953
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.56198385438156E-01, -8.61332995646302E-01)
-X( 2) = (  4.94399009347630E-02, -1.20325523796721E+00)
-X( 3) = ( -6.06553788190215E-01, -2.31001759558572E-01)
-X( 4) = ( -1.15464939628444E-01,  5.67627590305403E-01)
-
-X( 5) = (  9.57195253510064E-02, -5.74281273840489E-01)
-
-PATH NUMBER =      1954
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.65388589358790E-01, -3.99370167098807E-01)
-X( 2) = (  4.25709905601450E-01, -8.96937323542950E-01)
-X( 3) = ( -3.54386663761921E-01, -6.79274090131162E-01)
-X( 4) = ( -2.49027388039650E-01,  3.28920224796391E-01)
-
-X( 5) = ( -3.53057204824258E-01, -6.17220794527038E-01)
-
-PATH NUMBER =      1955
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.81173562106275E-01, -8.72061808319780E-02)
-X( 2) = (  4.04646179409316E-01, -4.93106515917053E-01)
-X( 3) = ( -1.02719288721037E-01, -9.09656492851643E-01)
-X( 4) = ( -2.11575182196040E-01,  4.08770585221133E-01)
-
-X( 5) = ( -5.40037689392003E-01, -4.67875464443975E-01)
-
-PATH NUMBER =      1956
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.69214854513492E-01,  2.26350452059573E-01)
-X( 2) = (  1.28932989456817E-01, -1.97293671985118E-01)
-X( 3) = (  2.38156059401911E-01, -9.24370981809450E-01)
-X( 4) = ( -2.34211950337023E-01,  4.94013323977256E-01)
-
-X( 5) = ( -7.59126549309177E-01, -3.01789743809246E-01)
-
-PATH NUMBER =      1957
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.81899190145538E-01,  3.94583098252083E-01)
-X( 2) = ( -2.72420398466487E-01, -1.47912909016456E-01)
-X( 3) = (  5.08740016812690E-01, -7.16532484087897E-01)
-X( 4) = ( -3.06345697069778E-01,  5.44762416233257E-01)
-
-X( 5) = ( -1.10799569079063E+00, -5.58213630436607E-02)
-
-PATH NUMBER =      1958
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.46335238481896E-01,  3.38773832894480E-01)
-X( 2) = ( -6.11616273605235E-01, -3.68070034810152E-01)
-X( 3) = (  5.82423342633082E-01, -3.83390942638506E-01)
-X( 4) = ( -3.94224240620753E-01,  5.37271797709217E-01)
-
-X( 5) = ( -2.06060564595193E+00,  5.13192085530469E-01)
-
-PATH NUMBER =      1959
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.61903894294698E-01,  8.50364314984800E-02)
-X( 2) = ( -7.29941116239761E-01, -7.54751083433428E-01)
-X( 3) = (  4.24728789812774E-01, -8.08269871612648E-02)
-X( 4) = ( -4.56728233801225E-01,  4.75046412061486E-01)
-
-X( 5) = ( -5.68582065771217E+00, -1.85774714999274E+01)
-
-PATH NUMBER =      1960
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.63939807459315E-01, -2.47902555845627E-01)
-X( 2) = ( -5.72029417467228E-01, -1.12702369475429E+00)
-X( 3) = (  1.09443392196125E-01,  4.95863449522202E-02)
-X( 4) = ( -4.64611363547544E-01,  3.87202208792767E-01)
-
-X( 5) = (  8.48475745986644E-01, -1.77779169709966E+00)
-
-PATH NUMBER =      1961
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.51490351579367E-01, -5.04257276754853E-01)
-X( 2) = ( -2.11769816136348E-01, -1.31069737658649E+00)
-X( 3) = ( -2.15907308665150E-01, -5.31727937766908E-02)
-X( 4) = ( -4.14185025840179E-01,  3.14842466892065E-01)
-
-X( 5) = (  1.55424396676742E-01, -1.06230230009533E+00)
-
-PATH NUMBER =      1962
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.76037011826219E-01, -5.64076508250404E-01)
-X( 2) = (  1.82268216450678E-01, -1.21982917189515E+00)
-X( 3) = ( -3.99088103967791E-01, -3.41022260296124E-01)
-X( 4) = ( -3.29044264518725E-01,  2.91825113783672E-01)
-
-X( 5) = ( -1.46928705809521E-01, -7.90486510600386E-01)
-
-PATH NUMBER =      1963
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.89513071865453E-01, -1.58906463512666E-01)
-X( 2) = (  5.38115817963919E-01, -8.24253298099909E-01)
-X( 3) = ( -1.24738914539848E-01, -6.30198312097017E-01)
-X( 4) = ( -2.35356228407921E-01, -1.96428734662221E-02)
-
-X( 5) = ( -8.72686590634093E-01, -5.90902284983472E-01)
-
-PATH NUMBER =      1964
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.05298044612938E-01,  1.53257522754164E-01)
-X( 2) = (  5.17052091771784E-01, -4.20422490474011E-01)
-X( 3) = (  1.26928460501036E-01, -8.60580714817497E-01)
-X( 4) = ( -1.97904022564311E-01,  6.02074869585196E-02)
-
-X( 5) = ( -8.40041694143092E-01, -1.67003355755363E-01)
-
-PATH NUMBER =      1965
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.93339337020154E-01,  4.66814155645714E-01)
-X( 2) = (  2.41338901819286E-01, -1.24609646542077E-01)
-X( 3) = (  4.67803808623984E-01, -8.75295203775304E-01)
-X( 4) = ( -2.20540790705293E-01,  1.45450225714643E-01)
-
-X( 5) = ( -7.87032300523040E-01,  1.51978116280219E-01)
-
-PATH NUMBER =      1966
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.02367265220056E-03,  6.35046801838224E-01)
-X( 2) = ( -1.60014486104019E-01, -7.52288835734153E-02)
-X( 3) = (  7.38387766034763E-01, -6.67456706053751E-01)
-X( 4) = ( -2.92674537438048E-01,  1.96199317970644E-01)
-
-X( 5) = ( -7.10839351757510E-01,  4.63077818753703E-01)
-
-PATH NUMBER =      1967
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.22210755975233E-01,  5.79237536480621E-01)
-X( 2) = ( -4.99210361242766E-01, -2.95386009367111E-01)
-X( 3) = (  8.12071091855154E-01, -3.34315164604360E-01)
-X( 4) = ( -3.80553080989023E-01,  1.88708699446604E-01)
-
-X( 5) = ( -5.78836873199046E-01,  8.53408209922065E-01)
-
-PATH NUMBER =      1968
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.37779411788035E-01,  3.25500135084621E-01)
-X( 2) = ( -6.17535203877293E-01, -6.82067057990388E-01)
-X( 3) = (  6.54376539034846E-01, -3.17512091271190E-02)
-X( 4) = ( -4.43057074169496E-01,  1.26483313798873E-01)
-
-X( 5) = ( -2.44239814900303E-01,  1.52449853832071E+00)
-
-PATH NUMBER =      1969
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.39815324952652E-01, -7.43885225948527E-03)
-X( 2) = ( -4.59623505104760E-01, -1.05433966931125E+00)
-X( 3) = (  3.39091141418198E-01,  9.86621229863658E-02)
-X( 4) = ( -4.50940203915815E-01,  3.86391105301542E-02)
-
-X( 5) = (  1.86412035808952E+00,  3.27522718156910E+00)
-
-PATH NUMBER =      1970
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.27365869072703E-01, -2.63793573168711E-01)
-X( 2) = ( -9.93639037738788E-02, -1.23801335114345E+00)
-X( 3) = (  1.37404405569225E-02, -4.09701574254516E-03)
-X( 4) = ( -4.00513866208450E-01, -3.37206313705476E-02)
-
-X( 5) = (  8.40065148896687E-01, -4.12314607939780E+00)
-
-PATH NUMBER =      1971
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.61494332882460E-04, -3.23612804664262E-01)
-X( 2) = (  2.94674128813147E-01, -1.14714514645211E+00)
-X( 3) = ( -1.69440354745718E-01, -2.91946482261979E-01)
-X( 4) = ( -3.15373104886996E-01, -5.67379844789404E-02)
-
-X( 5) = ( -8.19000523670705E-01, -1.38992313929731E+00)
-
-PATH NUMBER =      1972
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.17519764499260E-04, -8.77511831006181E-02)
-X( 2) = (  5.77503351525979E-01, -6.96320976583643E-01)
-X( 3) = (  1.96361655704256E-02, -4.44989357249869E-01)
-X( 4) = ( -8.31471783883922E-04, -2.77870045945309E-01)
-
-X( 5) = ( -2.40125355901168E+00,  3.03506112922791E-01)
-
-PATH NUMBER =      1973
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.16002492511984E-01,  2.24412803166211E-01)
-X( 2) = (  5.56439625333845E-01, -2.92490168957746E-01)
-X( 3) = (  2.71303540611309E-01, -6.75371759970350E-01)
-X( 4) = (  3.66207340597264E-02, -1.98019685520567E-01)
-
-X( 5) = ( -1.07039889284394E+00,  4.95469321620449E-01)
-
-PATH NUMBER =      1974
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.04378491920074E-03,  5.37969436057762E-01)
-X( 2) = (  2.80726435381345E-01,  3.32267497418805E-03)
-X( 3) = (  6.12178888734258E-01, -6.90086248928156E-01)
-X( 4) = (  1.39839659187441E-02, -1.12776946764443E-01)
-
-X( 5) = ( -6.09147003805475E-01,  5.88476297897762E-01)
-
-PATH NUMBER =      1975
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.83271879448753E-01,  7.06202082250272E-01)
-X( 2) = ( -1.20626952541959E-01,  5.27034379428502E-02)
-X( 3) = (  8.82762846145037E-01, -4.82247751206604E-01)
-X( 4) = ( -5.81497808140109E-02, -6.20278545084427E-02)
-
-X( 5) = ( -3.25393211648073E-01,  6.52627275281897E-01)
-
-PATH NUMBER =      1976
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.11506308076186E-01,  6.50392816892669E-01)
-X( 2) = ( -4.59822827680706E-01, -1.67453687850846E-01)
-X( 3) = (  9.56446171965428E-01, -1.49106209757212E-01)
-X( 4) = ( -1.46028324364986E-01, -6.95184730324829E-02)
-
-X( 5) = ( -8.64304517133446E-02,  7.10806250451694E-01)
-
-PATH NUMBER =      1977
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.27074963888989E-01,  3.96655415496669E-01)
-X( 2) = ( -5.78147670315233E-01, -5.54134736474122E-01)
-X( 3) = (  7.98751619145120E-01,  1.53457745720028E-01)
-X( 4) = ( -2.08532317545458E-01, -1.31743858680214E-01)
-
-X( 5) = (  1.73947307632365E-01,  7.78575547234914E-01)
-
-PATH NUMBER =      1978
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.29110877053606E-01,  6.37164281525622E-02)
-X( 2) = ( -4.20235971542700E-01, -9.26407347794985E-01)
-X( 3) = (  4.83466221528472E-01,  2.83871077833514E-01)
-X( 4) = ( -2.16415447291777E-01, -2.19588061948933E-01)
-
-X( 5) = (  5.50912954280946E-01,  8.84895930795381E-01)
-
-PATH NUMBER =      1979
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.16661421173657E-01, -1.92638292756664E-01)
-X( 2) = ( -5.99763702118189E-02, -1.11008102962719E+00)
-X( 3) = (  1.58115520667196E-01,  1.81111939104603E-01)
-X( 4) = ( -1.65989109584413E-01, -2.91947803849634E-01)
-
-X( 5) = (  1.40015643172542E+00,  1.16099423252503E+00)
-
-PATH NUMBER =      1980
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.89134057768071E-01, -2.52457524252215E-01)
-X( 2) = (  3.34061662375207E-01, -1.01921282493584E+00)
-X( 3) = ( -2.50652746354441E-02, -1.06737527414831E-01)
-X( 4) = ( -8.08483482629583E-02, -3.14965156958027E-01)
-
-X( 5) = (  9.84130222177970E+00,  8.01445449535336E+00)
-
-PATH NUMBER =      1981
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.67133462954109E-01, -2.19198672370316E-01)
-X( 2) = (  5.25442641590267E-01, -5.73001314040993E-01)
-X( 3) = (  1.11838720350178E-02, -2.10308553930952E-01)
-X( 4) = (  3.44810141755737E-01, -3.24933928762557E-01)
-
-X( 5) = (  1.94163112212213E+00,  1.97432566262237E+00)
-
-PATH NUMBER =      1982
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.51348490206624E-01,  9.29653138965131E-02)
-X( 2) = (  5.04378915398133E-01, -1.69170506415096E-01)
-X( 3) = (  2.62851247075902E-01, -4.40690956651433E-01)
-X( 4) = (  3.82262347599347E-01, -2.45083568337815E-01)
-
-X( 5) = ( -3.25056398729220E-01,  1.71849417871827E+00)
-
-PATH NUMBER =      1983
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.63307197799407E-01,  4.06521946788064E-01)
-X( 2) = (  2.28665725445634E-01,  1.26642337516839E-01)
-X( 3) = (  6.03726595198850E-01, -4.55405445609240E-01)
-X( 4) = (  3.59625579458365E-01, -1.59840829581691E-01)
-
-X( 5) = ( -1.71095257330399E-01,  9.43635568329011E-01)
-
-PATH NUMBER =      1984
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.50622862167361E-01,  5.74754592980574E-01)
-X( 2) = ( -1.72687662477671E-01,  1.76023100485501E-01)
-X( 3) = (  8.74310552609629E-01, -2.47566947887687E-01)
-X( 4) = (  2.87491832725610E-01, -1.09091737325691E-01)
-
-X( 5) = (  2.49295718966058E-02,  6.97009645038069E-01)
-
-PATH NUMBER =      1985
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.78857290794795E-01,  5.18945327622971E-01)
-X( 2) = ( -5.11883537616418E-01, -4.41340253081955E-02)
-X( 3) = (  9.47993878430020E-01,  8.55745935617049E-02)
-X( 4) = (  1.99613289174635E-01, -1.16582355849731E-01)
-
-X( 5) = (  1.77949489057617E-01,  5.72852841984211E-01)
-
-PATH NUMBER =      1986
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.09442594660760E+00,  2.65207926226971E-01)
-X( 2) = ( -6.30208380250945E-01, -4.30815073931471E-01)
-X( 3) = (  7.90299325609713E-01,  3.88138549038946E-01)
-X( 4) = (  1.37109295994163E-01, -1.78807741497462E-01)
-
-X( 5) = (  3.20810243588495E-01,  4.89560231542108E-01)
-
-PATH NUMBER =      1987
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.09646185977221E+00, -6.77310611171357E-02)
-X( 2) = ( -4.72296681478412E-01, -8.03087685252335E-01)
-X( 3) = (  4.75013927993064E-01,  5.18551881152431E-01)
-X( 4) = (  1.29226166247844E-01, -2.66651944766181E-01)
-
-X( 5) = (  4.85576094086776E-01,  4.23303322844291E-01)
-
-PATH NUMBER =      1988
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.84012403892266E-01, -3.24085782026362E-01)
-X( 2) = ( -1.12037080147531E-01, -9.86761367084536E-01)
-X( 3) = (  1.49663227131788E-01,  4.15792742423520E-01)
-X( 4) = (  1.79652503955208E-01, -3.39011686666882E-01)
-
-X( 5) = (  7.29119567052900E-01,  3.73574423136182E-01)
-
-PATH NUMBER =      1989
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.56485040486679E-01, -3.83905013521913E-01)
-X( 2) = (  2.82000952439495E-01, -8.95893162393194E-01)
-X( 3) = ( -3.35175681708519E-02,  1.27943275904086E-01)
-X( 4) = (  2.64793265276663E-01, -3.62029039775275E-01)
-
-X( 5) = (  1.22805279658404E+00,  4.33125045505218E-01)
-
-PATH NUMBER =      1990
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.87443380201130E-01, -4.91743190216351E-01)
-X( 2) = (  4.06293472926045E-01, -5.11996951121048E-01)
-X( 3) = ( -1.46140873064075E-01, -3.59656581997921E-02)
-X( 4) = (  6.39839059857107E-01, -1.38812808090980E-01)
-
-X( 5) = (  1.11914993667843E+00, -1.40439114207680E-02)
-
-PATH NUMBER =      1991
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.71658407453645E-01, -1.79579203949522E-01)
-X( 2) = (  3.85229746733911E-01, -1.08166143495151E-01)
-X( 3) = (  1.05526501976809E-01, -2.66348060920273E-01)
-X( 4) = (  6.77291265700717E-01, -5.89624476662386E-02)
-
-X( 5) = (  1.43920148077849E+00,  7.90110283135447E-01)
-
-PATH NUMBER =      1992
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.83617115046428E-01,  1.33977428942029E-01)
-X( 2) = (  1.09516556781412E-01,  1.87646700436783E-01)
-X( 3) = (  4.46401850099757E-01, -2.81062549878080E-01)
-X( 4) = (  6.54654497559735E-01,  2.62802910898851E-02)
-
-X( 5) = (  5.82413742411400E-01,  9.71195910887649E-01)
-
-PATH NUMBER =      1993
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.70932779414382E-01,  3.02210075134539E-01)
-X( 2) = ( -2.91836831141893E-01,  2.37027463405445E-01)
-X( 3) = (  7.16985807510536E-01, -7.32240521565265E-02)
-X( 4) = (  5.82520750826980E-01,  7.70293833458858E-02)
-
-X( 5) = (  3.77132720035262E-01,  6.34989468220074E-01)
-
-PATH NUMBER =      1994
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.99167208041816E-01,  2.46400809776935E-01)
-X( 2) = ( -6.31032706280640E-01,  1.68703376117489E-02)
-X( 3) = (  7.90669133330927E-01,  2.59917489292865E-01)
-X( 4) = (  4.94642207276004E-01,  6.95387648218455E-02)
-
-X( 5) = (  3.73409988811725E-01,  4.35478245285857E-01)
-
-PATH NUMBER =      1995
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.21473586385462E+00, -7.33659161906395E-03)
-X( 2) = ( -7.49357548915166E-01, -3.69810711011527E-01)
-X( 3) = (  6.32974580510620E-01,  5.62481444770105E-01)
-X( 4) = (  4.32138214095532E-01,  7.31337917411461E-03)
-
-X( 5) = (  4.11429884362315E-01,  3.02793855746411E-01)
-
-PATH NUMBER =      1996
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.21677177701923E+00, -3.40275578963171E-01)
-X( 2) = ( -5.91445850142634E-01, -7.42083322332390E-01)
-X( 3) = (  3.17689182893971E-01,  6.92894776883591E-01)
-X( 4) = (  4.24255084349213E-01, -8.05308240946045E-02)
-
-X( 5) = (  4.71209494555570E-01,  1.95579526366546E-01)
-
-PATH NUMBER =      1997
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.00432232113929E+00, -5.96630299872396E-01)
-X( 2) = ( -2.31186248811753E-01, -9.25757004164591E-01)
-X( 3) = ( -7.66151796730426E-03,  5.90135638154679E-01)
-X( 4) = (  4.74681422056578E-01, -1.52890565995306E-01)
-
-X( 5) = (  5.63530870902927E-01,  9.39727789084013E-02)
-
-PATH NUMBER =      1998
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.76794957733701E-01, -6.56449531367948E-01)
-X( 2) = (  1.62851783775273E-01, -8.34888799473250E-01)
-X( 3) = ( -1.90842313269945E-01,  3.02286171635246E-01)
-X( 4) = (  5.59822183378032E-01, -1.75907919103699E-01)
-
-X( 5) = (  7.32858942686899E-01, -7.12595702644729E-03)
-
-PATH NUMBER =      1999
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.04417884600892E-01, -7.77858127743646E-01)
-X( 2) = (  2.75807065746810E-01, -5.41852507222025E-01)
-X( 3) = ( -3.78724073025207E-01, -3.53764857445557E-03)
-X( 4) = (  7.46207972859403E-01,  1.93405175201343E-01)
-
-X( 5) = (  6.50494333440969E-01, -3.37597761692734E-01)
-
-PATH NUMBER =      2000
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.88632911853407E-01, -4.65694141476816E-01)
-X( 2) = (  2.54743339554676E-01, -1.38021699596128E-01)
-X( 3) = ( -1.27056697984323E-01, -2.33920051294936E-01)
-X( 4) = (  7.83660178703014E-01,  2.73255535626084E-01)
-
-X( 5) = (  1.02560078485293E+00, -3.90455021472854E-01)
-
-PATH NUMBER =      2001
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.00591619446190E-01, -1.52137508585266E-01)
-X( 2) = ( -2.09698503978228E-02,  1.57791144335807E-01)
-X( 3) = (  2.13818650138625E-01, -2.48634540252743E-01)
-X( 4) = (  7.61023410562031E-01,  3.58498274382207E-01)
-
-X( 5) = (  1.25434067953059E+00,  2.27489044375907E-01)
-
-PATH NUMBER =      2002
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.87907283814144E-01,  1.60951376072445E-02)
-X( 2) = ( -4.22323238321128E-01,  2.07171907304469E-01)
-X( 3) = (  4.84402607549404E-01, -4.07960425311894E-02)
-X( 4) = (  6.88889663829276E-01,  4.09247366638208E-01)
-
-X( 5) = (  7.66011988848409E-01,  4.15106200068850E-01)
-
-PATH NUMBER =      2003
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.16141712441578E-01, -3.97141277503589E-02)
-X( 2) = ( -7.61519113459875E-01, -1.29852184892273E-02)
-X( 3) = (  5.58085933369796E-01,  2.92345498918202E-01)
-X( 4) = (  6.01011120278301E-01,  4.01756748114168E-01)
-
-X( 5) = (  5.56916850919499E-01,  2.70712555232381E-01)
-
-PATH NUMBER =      2004
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.13171036825438E+00, -2.93451529146358E-01)
-X( 2) = ( -8.79843956094401E-01, -3.99666267112503E-01)
-X( 3) = (  4.00391380549488E-01,  5.94909454395443E-01)
-X( 4) = (  5.38507127097829E-01,  3.39531362466437E-01)
-
-X( 5) = (  4.87817739771360E-01,  1.39828649842817E-01)
-
-PATH NUMBER =      2005
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.13374628141900E+00, -6.26390516490465E-01)
-X( 2) = ( -7.21932257321869E-01, -7.71938878433367E-01)
-X( 3) = (  8.51059829328391E-02,  7.25322786508928E-01)
-X( 4) = (  5.30623997351510E-01,  2.51687159197718E-01)
-
-X( 5) = (  4.68062396484145E-01,  2.94875598878937E-02)
-
-PATH NUMBER =      2006
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.21296825539049E-01, -8.82745237399692E-01)
-X( 2) = ( -3.61672655990987E-01, -9.55612560265568E-01)
-X( 3) = ( -2.40244717928437E-01,  6.22563647780016E-01)
-X( 4) = (  5.81050335058874E-01,  1.79327417297017E-01)
-
-X( 5) = (  4.76804748498168E-01, -7.68359126846884E-02)
-
-PATH NUMBER =      2007
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.93769462133463E-01, -9.42564468895242E-01)
-X( 2) = (  3.23653765960382E-02, -8.64744355574226E-01)
-X( 3) = ( -4.23425513231077E-01,  3.34714181260583E-01)
-X( 4) = (  6.66191096380329E-01,  1.56310064188624E-01)
-
-X( 5) = (  5.21243959985799E-01, -1.95408495697648E-01)
-
-PATH NUMBER =      2008
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.69055282703470E-02, -9.43667125869846E-01)
-X( 2) = (  1.95039460166607E-01, -6.48598235836730E-01)
-X( 3) = ( -5.77737463712225E-01, -1.28197951155820E-01)
-X( 4) = (  6.14145684210063E-01,  5.16271534540321E-01)
-
-X( 5) = (  3.74608637383397E-01, -4.62449035913458E-01)
-
-PATH NUMBER =      2009
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.88794444771380E-02, -6.31503139603016E-01)
-X( 2) = (  1.73975733974472E-01, -2.44767428210832E-01)
-X( 3) = ( -3.26070088671341E-01, -3.58580353876300E-01)
-X( 4) = (  6.51597890053674E-01,  5.96121894965063E-01)
-
-X( 5) = (  4.68539971737528E-01, -6.71991661668594E-01)
-
-PATH NUMBER =      2010
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.30792631156454E-02, -3.17946506711466E-01)
-X( 2) = ( -1.01737455978027E-01,  5.10454157211020E-02)
-X( 3) = (  1.48052594516074E-02, -3.73294842834107E-01)
-X( 4) = (  6.28961121912691E-01,  6.81364633721186E-01)
-
-X( 5) = (  9.21712160509740E-01, -8.00576034227224E-01)
-
-PATH NUMBER =      2011
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.40394927483599E-01, -1.49713860518955E-01)
-X( 2) = ( -5.03090843901331E-01,  1.00426178689764E-01)
-X( 3) = (  2.85389216862387E-01, -1.65456345112554E-01)
-X( 4) = (  5.56827375179936E-01,  7.32113725977187E-01)
-
-X( 5) = (  1.14219203448785E+00, -1.73878244080844E-01)
-
-PATH NUMBER =      2012
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.68629356111033E-01, -2.05523125876559E-01)
-X( 2) = ( -8.42286719040078E-01, -1.19730947103932E-01)
-X( 3) = (  3.59072542682778E-01,  1.67685196336837E-01)
-X( 4) = (  4.68948831628961E-01,  7.24623107453147E-01)
-
-X( 5) = (  7.69457866251870E-01,  1.71170034874527E-02)
-
-PATH NUMBER =      2013
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.84198011923836E-01, -4.59260527272559E-01)
-X( 2) = ( -9.60611561674605E-01, -5.06411995727208E-01)
-X( 3) = (  2.01377989862470E-01,  4.70249151814078E-01)
-X( 4) = (  4.06444838448489E-01,  6.62397721805416E-01)
-
-X( 5) = (  5.71038608915374E-01, -4.39958693503491E-02)
-
-PATH NUMBER =      2014
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.86233925088451E-01, -7.92199514616665E-01)
-X( 2) = ( -8.02699862902072E-01, -8.78684607048071E-01)
-X( 3) = ( -1.13907407754178E-01,  6.00662483927563E-01)
-X( 4) = (  3.98561708702170E-01,  5.74553518536697E-01)
-
-X( 5) = (  4.70825934227961E-01, -1.29486181486989E-01)
-
-PATH NUMBER =      2015
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.73784469208504E-01, -1.04855423552589E+00)
-X( 2) = ( -4.42440261571191E-01, -1.06235828888027E+00)
-X( 3) = ( -4.39258108615454E-01,  4.97903345198652E-01)
-X( 4) = (  4.48988046409534E-01,  5.02193776635996E-01)
-
-X( 5) = (  4.12102173103264E-01, -2.19378315037736E-01)
-
-PATH NUMBER =      2016
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.46257105802918E-01, -1.10837346702144E+00)
-X( 2) = ( -4.84022289841652E-02, -9.71490084188931E-01)
-X( 3) = ( -6.22438903918094E-01,  2.10053878679218E-01)
-X( 4) = (  5.34128807730989E-01,  4.79176423527603E-01)
-
-X( 5) = (  3.77737220852704E-01, -3.23142360990095E-01)
-
-PATH NUMBER =      2017
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.39279906470011E-01, -9.11586311609953E-01)
-X( 2) = (  2.01782716468360E-01, -7.82286624199715E-01)
-X( 3) = ( -6.50060467835205E-01, -3.51616624921126E-01)
-X( 4) = (  3.05445606476965E-01,  6.78713512131358E-01)
-
-X( 5) = (  1.56160554493052E-01, -5.33784407542668E-01)
-
-PATH NUMBER =      2018
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.55064879217496E-01, -5.99422325343123E-01)
-X( 2) = (  1.80718990276226E-01, -3.78455816573818E-01)
-X( 3) = ( -3.98393092794321E-01, -5.81999027641606E-01)
-X( 4) = (  3.42897812320575E-01,  7.58563872556100E-01)
-
-X( 5) = (  7.12138767640240E-02, -6.96252368090283E-01)
-
-PATH NUMBER =      2019
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.43106171624713E-01, -2.85865692451572E-01)
-X( 2) = ( -9.49941996762731E-02, -8.26429726418834E-02)
-X( 3) = ( -5.75177446713725E-02, -5.96713516599413E-01)
-X( 4) = (  3.20261044179592E-01,  8.43806611312223E-01)
-
-X( 5) = (  7.12844838829512E-02, -1.03983351961299E+00)
-
-PATH NUMBER =      2020
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.42094927432409E-02, -1.17633046259062E-01)
-X( 2) = ( -4.96347587599578E-01, -3.32622096732216E-02)
-X( 3) = (  2.13066212739407E-01, -3.88875018877860E-01)
-X( 4) = (  2.48127297446837E-01,  8.94555703568224E-01)
-
-X( 5) = (  7.67591311574779E-01, -1.39462103722263E+00)
-
-PATH NUMBER =      2021
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.72443921370674E-01, -1.73442311616665E-01)
-X( 2) = ( -8.35543462738324E-01, -2.53419335466918E-01)
-X( 3) = (  2.86749538559798E-01, -5.57334774284690E-02)
-X( 4) = (  1.60248753895862E-01,  8.87065085044184E-01)
-
-X( 5) = (  1.05124748211737E+00, -5.51086668500141E-01)
-
-PATH NUMBER =      2022
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.88012577183477E-01, -4.27179713012665E-01)
-X( 2) = ( -9.53868305372851E-01, -6.40100384090194E-01)
-X( 3) = (  1.29054985739491E-01,  2.46830478048772E-01)
-X( 4) = (  9.77447607153898E-02,  8.24839699396453E-01)
-
-X( 5) = (  6.91282286153285E-01, -3.22455449809799E-01)
-
-PATH NUMBER =      2023
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.90048490348093E-01, -7.60118700356772E-01)
-X( 2) = ( -7.95956606600318E-01, -1.01237299541106E+00)
-X( 3) = ( -1.86230411877158E-01,  3.77243810162257E-01)
-X( 4) = (  8.98616309690705E-02,  7.36995496127734E-01)
-
-X( 5) = (  4.82113294725641E-01, -3.26579512941508E-01)
-
-PATH NUMBER =      2024
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.77599034468145E-01, -1.01647342126600E+00)
-X( 2) = ( -4.35697005269438E-01, -1.19604667724326E+00)
-X( 3) = ( -5.11581112738433E-01,  2.74484671433346E-01)
-X( 4) = (  1.40287968676436E-01,  6.64635754227032E-01)
-
-X( 5) = (  3.49765230785549E-01, -3.72929336833736E-01)
-
-PATH NUMBER =      2025
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.00716710625591E-02, -1.07629265276155E+00)
-X( 2) = ( -4.16589726824115E-02, -1.10517847255192E+00)
-X( 3) = ( -6.94761908041074E-01, -1.33647950860878E-02)
-X( 4) = (  2.25428729997890E-01,  6.41618401118640E-01)
-
-X( 5) = (  2.47837649310847E-01, -4.38799507290336E-01)
-
-PATH NUMBER =      2026
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.70513147838566E-01, -6.36941796548444E-01)
-X( 2) = (  3.81966734624253E-01, -1.16545820882747E+00)
-X( 3) = ( -2.29138534909987E-01, -1.58754943130095E-01)
-X( 4) = ( -1.67605362426580E-01,  3.78265390678249E-01)
-
-X( 5) = ( -4.26521172327011E-01, -5.19186732128861E-01)
-
-PATH NUMBER =      2027
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.86298120586051E-01, -3.24777810281614E-01)
-X( 2) = (  3.60903008432119E-01, -7.61627401201577E-01)
-X( 3) = (  2.25288401308966E-02, -3.89137345850575E-01)
-X( 4) = ( -1.30153156582969E-01,  4.58115751102991E-01)
-
-X( 5) = ( -5.39801050410177E-01, -3.50008654763479E-01)
-
-PATH NUMBER =      2028
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.74339412993268E-01, -1.12211773900637E-02)
-X( 2) = (  8.51898184796199E-02, -4.65814557269642E-01)
-X( 3) = (  3.63404188253845E-01, -4.03851834808382E-01)
-X( 4) = ( -1.52789924723952E-01,  5.43358489859114E-01)
-
-X( 5) = ( -6.71541258215435E-01, -1.85093192200314E-01)
-
-PATH NUMBER =      2029
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87023748625314E-01,  1.57011468802447E-01)
-X( 2) = ( -3.16163569443684E-01, -4.16433794300981E-01)
-X( 3) = (  6.33988145664624E-01, -1.96013337086829E-01)
-X( 4) = ( -2.24923671456707E-01,  5.94107582115115E-01)
-
-X( 5) = ( -8.71643507013297E-01,  1.93145651407742E-02)
-
-PATH NUMBER =      2030
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.41210680002119E-01,  1.01202203444843E-01)
-X( 2) = ( -6.55359444582431E-01, -6.36590920094677E-01)
-X( 3) = (  7.07671471485016E-01,  1.37128204362563E-01)
-X( 4) = ( -3.12802215007682E-01,  5.86616963591075E-01)
-
-X( 5) = ( -1.33008751357534E+00,  3.49005837389823E-01)
-
-PATH NUMBER =      2031
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.56779335814922E-01, -1.52535197951156E-01)
-X( 2) = ( -7.73684287216958E-01, -1.02327196871795E+00)
-X( 3) = (  5.49976918664708E-01,  4.39692159839804E-01)
-X( 4) = ( -3.75306208188154E-01,  5.24391577943344E-01)
-
-X( 5) = ( -3.79811817973755E+00,  3.12925293472071E-01)
-
-PATH NUMBER =      2032
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.58815248979538E-01, -4.85474185295263E-01)
-X( 2) = ( -6.15772588444425E-01, -1.39554458003882E+00)
-X( 3) = (  2.34691521048059E-01,  5.70105491953288E-01)
-X( 4) = ( -3.83189337934473E-01,  4.36547374674625E-01)
-
-X( 5) = ( -1.84281529837162E-01, -2.56824902875674E+00)
-
-PATH NUMBER =      2033
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.46365793099590E-01, -7.41828906204489E-01)
-X( 2) = ( -2.55512987113544E-01, -1.57921826187102E+00)
-X( 3) = ( -9.06591798132164E-02,  4.67346353224377E-01)
-X( 4) = ( -3.32763000227109E-01,  3.64187632773923E-01)
-
-X( 5) = ( -1.51554912851823E-01, -1.15540348519228E+00)
-
-PATH NUMBER =      2034
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.81161570305996E-01, -8.01648137700040E-01)
-X( 2) = (  1.38525045473482E-01, -1.48835005717968E+00)
-X( 3) = ( -2.73839975115857E-01,  1.79496886704944E-01)
-X( 4) = ( -2.47622238905654E-01,  3.41170279665531E-01)
-
-X( 5) = ( -3.05317649015641E-01, -7.42478963077929E-01)
-
-PATH NUMBER =      2035
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.90351774226629E-01, -3.39685309152546E-01)
-X( 2) = (  5.14795050140169E-01, -1.18203214275542E+00)
-X( 3) = ( -2.16728506875623E-02, -2.68775443867647E-01)
-X( 4) = ( -3.81184687316861E-01,  1.02462914156518E-01)
-
-X( 5) = ( -5.64663137386671E-01, -2.63438457653672E-01)
-
-PATH NUMBER =      2036
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.06136746974114E-01, -2.75213228857167E-02)
-X( 2) = (  4.93731323948035E-01, -7.78201335129523E-01)
-X( 3) = (  2.29994524353322E-01, -4.99157846588127E-01)
-X( 4) = ( -3.43732481473250E-01,  1.82313274581260E-01)
-
-X( 5) = ( -5.28796747640093E-01, -1.09093366364168E-01)
-
-PATH NUMBER =      2037
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.94178039381331E-01,  2.86035310005834E-01)
-X( 2) = (  2.18018133995536E-01, -4.82388491197588E-01)
-X( 3) = (  5.70869872476270E-01, -5.13872335545934E-01)
-X( 4) = ( -3.66369249614233E-01,  2.67556013337383E-01)
-
-X( 5) = ( -5.26891843307173E-01,  2.50372579861745E-02)
-
-PATH NUMBER =      2038
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.06862375013377E-01,  4.54267956198345E-01)
-X( 2) = ( -1.83335253927769E-01, -4.33007728228926E-01)
-X( 3) = (  8.41453829887049E-01, -3.06033837824381E-01)
-X( 4) = ( -4.38502996346988E-01,  3.18305105593384E-01)
-
-X( 5) = ( -5.53892158639529E-01,  1.66147352061069E-01)
-
-PATH NUMBER =      2039
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.21372053614056E-01,  3.98458690840741E-01)
-X( 2) = ( -5.22531129066516E-01, -6.53164854022623E-01)
-X( 3) = (  9.15137155707441E-01,  2.71077036250106E-02)
-X( 4) = ( -5.26381539897963E-01,  3.10814487069344E-01)
-
-X( 5) = ( -6.37823544220434E-01,  3.44923044543216E-01)
-
-PATH NUMBER =      2040
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.36940709426859E-01,  1.44721289444742E-01)
-X( 2) = ( -6.40855971701043E-01, -1.03984590264590E+00)
-X( 3) = (  7.57442602887133E-01,  3.29671659102251E-01)
-X( 4) = ( -5.88885533078435E-01,  2.48589101421613E-01)
-
-X( 5) = ( -9.20528931487827E-01,  5.88454408955432E-01)
-
-PATH NUMBER =      2041
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.38976622591476E-01, -1.88217697899365E-01)
-X( 2) = ( -4.82944272928510E-01, -1.41211851396676E+00)
-X( 3) = (  4.42157205270485E-01,  4.60084991215736E-01)
-X( 4) = ( -5.96768662824754E-01,  1.60744898152894E-01)
-
-X( 5) = ( -1.81614137763221E+00,  2.84059547847642E-01)
-
-PATH NUMBER =      2042
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.26527166711527E-01, -4.44572418808591E-01)
-X( 2) = ( -1.22684671597629E-01, -1.59579219579896E+00)
-X( 3) = (  1.16806504409209E-01,  3.57325852486826E-01)
-X( 4) = ( -5.46342325117389E-01,  8.83851562521923E-02)
-
-X( 5) = ( -1.17234219611236E+00, -7.15952607289231E-01)
-
-PATH NUMBER =      2043
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.01000196694059E-01, -5.04391650304142E-01)
-X( 2) = (  2.71353360989397E-01, -1.50492399110762E+00)
-X( 3) = ( -6.63742908934318E-02,  6.94763859673917E-02)
-X( 4) = ( -4.61201563795935E-01,  6.53678031437996E-02)
-
-X( 5) = ( -6.87554607524216E-01, -4.75841237137763E-01)
-
-PATH NUMBER =      2044
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.14476256733292E-01, -9.92216055664040E-02)
-X( 2) = (  6.27200962502637E-01, -1.10934811731238E+00)
-X( 3) = (  2.07974898534511E-01, -2.19699665833501E-01)
-X( 4) = ( -3.67513527685132E-01, -2.46100184106095E-01)
-
-X( 5) = ( -6.48564763424188E-01,  4.29848726455599E-03)
-
-PATH NUMBER =      2045
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.30261229480777E-01,  2.12942380700425E-01)
-X( 2) = (  6.06137236310503E-01, -7.05517309686482E-01)
-X( 3) = (  4.59642273575395E-01, -4.50082068553981E-01)
-X( 4) = ( -3.30061321841521E-01, -1.66249823681353E-01)
-
-X( 5) = ( -5.11949487703093E-01,  8.46957128172093E-02)
-
-PATH NUMBER =      2046
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.18302521887994E-01,  5.26499013591976E-01)
-X( 2) = (  3.30424046358004E-01, -4.09704465754547E-01)
-X( 3) = (  8.00517621698343E-01, -4.64796557511788E-01)
-X( 4) = ( -3.52698089982503E-01, -8.10070849252296E-02)
-
-X( 5) = ( -4.37222859305295E-01,  1.71870555927161E-01)
-
-PATH NUMBER =      2047
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.09868575200400E-02,  6.94731659784486E-01)
-X( 2) = ( -7.09293415653004E-02, -3.60323702785885E-01)
-X( 3) = (  1.07110157910912E+00, -2.56958059790235E-01)
-X( 4) = ( -4.24831836715259E-01, -3.02579926692288E-02)
-
-X( 5) = ( -3.92176387457813E-01,  2.66645286453202E-01)
-
-PATH NUMBER =      2048
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.97247571107394E-01,  6.38922394426883E-01)
-X( 2) = ( -4.10125216704047E-01, -5.80480828579582E-01)
-X( 3) = (  1.14478490492951E+00,  7.61834816591564E-02)
-X( 4) = ( -5.12710380266234E-01, -3.77486111932690E-02)
-
-X( 5) = ( -3.71603840567013E-01,  3.84260417105212E-01)
-
-PATH NUMBER =      2049
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.12816226920196E-01,  3.85184993030883E-01)
-X( 2) = ( -5.28450059338574E-01, -9.67161877202858E-01)
-X( 3) = (  9.87090352109205E-01,  3.78747437136397E-01)
-X( 4) = ( -5.75214373446706E-01, -9.99739968409999E-02)
-
-X( 5) = ( -4.02395240171912E-01,  5.53851429249423E-01)
-
-PATH NUMBER =      2050
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.14852140084812E-01,  5.22460056867768E-02)
-X( 2) = ( -3.70538360566041E-01, -1.33943448852372E+00)
-X( 3) = (  6.71804954492557E-01,  5.09160769249882E-01)
-X( 4) = ( -5.83097503193025E-01, -1.87818200109719E-01)
-
-X( 5) = ( -6.32641169118110E-01,  7.82437107123887E-01)
-
-PATH NUMBER =      2051
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.02402684204864E-01, -2.04108715222449E-01)
-X( 2) = ( -1.02787592351604E-02, -1.52310817035592E+00)
-X( 3) = (  3.46454253631282E-01,  4.06401630520971E-01)
-X( 4) = ( -5.32671165485661E-01, -2.60177942010420E-01)
-
-X( 5) = ( -1.18524939280165E+00,  5.17361634833197E-01)
-
-PATH NUMBER =      2052
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.51246792007217E-02, -2.63927946718000E-01)
-X( 2) = (  3.83759273351866E-01, -1.43223996566458E+00)
-X( 3) = (  1.63273458328641E-01,  1.18552164001537E-01)
-X( 4) = ( -4.47530404164206E-01, -2.83195295118813E-01)
-
-X( 5) = ( -9.33824404219973E-01,  7.11867401243169E-03)
-
-PATH NUMBER =      2053
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.51807046323384E-02, -2.80663251543564E-02)
-X( 2) = (  6.66588496064697E-01, -9.81415795796113E-01)
-X( 3) = (  3.52349978644784E-01, -3.44907109863534E-02)
-X( 4) = ( -1.32988771061094E-01, -5.04327356585182E-01)
-
-X( 5) = ( -6.80903973366153E-01,  3.46876726256742E-01)
-
-PATH NUMBER =      2054
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.40965677379824E-01,  2.84097661112473E-01)
-X( 2) = (  6.45524769872563E-01, -5.77584988170216E-01)
-X( 3) = (  6.04017353685668E-01, -2.64873113706834E-01)
-X( 4) = ( -9.55365652174836E-02, -4.24476996160440E-01)
-
-X( 5) = ( -4.86731894876957E-01,  2.86626328890791E-01)
-
-PATH NUMBER =      2055
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.90069697870401E-02,  5.97654294004024E-01)
-X( 2) = (  3.69811579920064E-01, -2.81772144238282E-01)
-X( 3) = (  9.44892701808617E-01, -2.79587602664641E-01)
-X( 4) = ( -1.18173333358466E-01, -3.39234257404316E-01)
-
-X( 5) = ( -3.62085930302741E-01,  3.07334799792748E-01)
-
-PATH NUMBER =      2056
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.58308694580914E-01,  7.65886940196534E-01)
-X( 2) = ( -3.15418080032403E-02, -2.32391381269620E-01)
-X( 3) = (  1.21547665921940E+00, -7.17491049430873E-02)
-X( 4) = ( -1.90307080091221E-01, -2.88485165148316E-01)
-
-X( 5) = ( -2.73478820476242E-01,  3.53725967958482E-01)
-
-PATH NUMBER =      2057
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.86543123208347E-01,  7.10077674838930E-01)
-X( 2) = ( -3.70737683141987E-01, -4.52548507063316E-01)
-X( 3) = (  1.28915998503979E+00,  2.61392436506304E-01)
-X( 4) = ( -2.78185623642196E-01, -2.95975783672356E-01)
-
-X( 5) = ( -2.02145687473487E-01,  4.21597673517039E-01)
-
-PATH NUMBER =      2058
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.02111779021150E-01,  4.56340273442930E-01)
-X( 2) = ( -4.89062525776514E-01, -8.39229555686593E-01)
-X( 3) = (  1.13146543221948E+00,  5.63956391983545E-01)
-X( 4) = ( -3.40689616822668E-01, -3.58201169320087E-01)
-
-X( 5) = ( -1.44112209675790E-01,  5.26990083199388E-01)
-
-PATH NUMBER =      2059
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.04147692185766E-01,  1.23401286098824E-01)
-X( 2) = ( -3.31150827003981E-01, -1.21150216700746E+00)
-X( 3) = (  8.16180034602831E-01,  6.94369724097030E-01)
-X( 4) = ( -3.48572746568988E-01, -4.46045372588806E-01)
-
-X( 5) = ( -1.30931710667793E-01,  7.13087196160466E-01)
-
-PATH NUMBER =      2060
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.91698236305818E-01, -1.32953434810402E-01)
-X( 2) = (  2.91087743269001E-02, -1.39517584883966E+00)
-X( 3) = (  4.90829333741555E-01,  5.91610585368119E-01)
-X( 4) = ( -2.98146408861623E-01, -5.18405114489507E-01)
-
-X( 5) = ( -3.66427141973747E-01,  9.83072345614757E-01)
-
-PATH NUMBER =      2061
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.64170872900232E-01, -1.92772666305952E-01)
-X( 2) = (  4.23146806913926E-01, -1.30430764414831E+00)
-X( 3) = (  3.07648538438915E-01,  3.03761118848685E-01)
-X( 4) = ( -2.13005647540168E-01, -5.41422467597900E-01)
-
-X( 5) = ( -8.33888043743485E-01,  7.10225618107757E-01)
-
-PATH NUMBER =      2062
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.42170278086269E-01, -1.59513814424055E-01)
-X( 2) = (  6.14527786128986E-01, -8.58096133253463E-01)
-X( 3) = (  3.43897685109377E-01,  2.00190092332563E-01)
-X( 4) = (  2.12652842478527E-01, -5.51391239402429E-01)
-
-X( 5) = ( -5.63538023120712E-01,  8.96094238917133E-01)
-
-PATH NUMBER =      2063
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.26385305338784E-01,  1.52650171842775E-01)
-X( 2) = (  5.93464059936851E-01, -4.54265325627566E-01)
-X( 3) = (  5.95565060150261E-01, -3.01923103879171E-02)
-X( 4) = (  2.50105048322137E-01, -4.71540878977687E-01)
-
-X( 5) = ( -4.39422572908223E-01,  5.62537547396951E-01)
-
-PATH NUMBER =      2064
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.38344012931568E-01,  4.66206804734325E-01)
-X( 2) = (  3.17750869984352E-01, -1.58452481695632E-01)
-X( 3) = (  9.36440408273209E-01, -4.49067993457240E-02)
-X( 4) = (  2.27468280181155E-01, -3.86298140221564E-01)
-
-X( 5) = ( -2.81498262449123E-01,  4.68551759764302E-01)
-
-PATH NUMBER =      2065
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.25659677299522E-01,  6.34439450926835E-01)
-X( 2) = ( -8.36025179389523E-02, -1.09071718726969E-01)
-X( 3) = (  1.20702436568399E+00,  1.62931698375829E-01)
-X( 4) = (  1.55334533448400E-01, -3.35549047965563E-01)
-
-X( 5) = ( -1.60280437945384E-01,  4.49108850972793E-01)
-
-PATH NUMBER =      2066
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.53894105926955E-01,  5.78630185569232E-01)
-X( 2) = ( -4.22798393077699E-01, -3.29228844520666E-01)
-X( 3) = (  1.28070769150438E+00,  4.96073239825221E-01)
-X( 4) = (  6.74559898974246E-02, -3.43039666489603E-01)
-
-X( 5) = ( -5.65779859541389E-02,  4.61618534557604E-01)
-
-PATH NUMBER =      2067
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.06946276173976E+00,  3.24892784173232E-01)
-X( 2) = ( -5.41123235712226E-01, -7.15909893143942E-01)
-X( 3) = (  1.12301313868407E+00,  7.98637195302462E-01)
-X( 4) = (  4.95199671695242E-03, -4.05265052137334E-01)
-
-X( 5) = (  4.60181733971586E-02,  5.03093646103716E-01)
-
-PATH NUMBER =      2068
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07149867490437E+00, -8.04620317087405E-03)
-X( 2) = ( -3.83211536939693E-01, -1.08818250446480E+00)
-X( 3) = (  8.07727741067423E-01,  9.29050527415946E-01)
-X( 4) = ( -2.93113302936711E-03, -4.93109255406053E-01)
-
-X( 5) = (  1.58499169837860E-01,  5.98083130140902E-01)
-
-PATH NUMBER =      2069
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.59049219024426E-01, -2.64400924080100E-01)
-X( 2) = ( -2.29519356088124E-02, -1.27185618629701E+00)
-X( 3) = (  4.82377040206148E-01,  8.26291388687035E-01)
-X( 4) = (  4.74952046779975E-02, -5.65468997306755E-01)
-
-X( 5) = (  2.50843285414655E-01,  8.34697029138062E-01)
-
-PATH NUMBER =      2070
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.31521855618840E-01, -3.24220155575651E-01)
-X( 2) = (  3.71086096978214E-01, -1.18098798160566E+00)
-X( 3) = (  2.99196244903507E-01,  5.38441922167601E-01)
-X( 4) = (  1.32635965999452E-01, -5.88486350415147E-01)
-
-X( 5) = ( -5.00793783439415E-02,  1.25171268038709E+00)
-
-PATH NUMBER =      2071
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.62480195333291E-01, -4.32058332270090E-01)
-X( 2) = (  4.95378617464763E-01, -7.97091770333519E-01)
-X( 3) = (  1.86572940010283E-01,  3.74532988063724E-01)
-X( 4) = (  5.07681760579897E-01, -3.65270118730853E-01)
-
-X( 5) = (  4.56357704532452E-01,  1.76528453282060E+00)
-
-PATH NUMBER =      2072
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.46695222585806E-01, -1.19894346003260E-01)
-X( 2) = (  4.74314891272629E-01, -3.93260962707621E-01)
-X( 3) = (  4.38240315051168E-01,  1.44150585343243E-01)
-X( 4) = (  5.45133966423507E-01, -2.85419758306111E-01)
-
-X( 5) = ( -2.97417123254695E-01,  1.11802944265576E+00)
-
-PATH NUMBER =      2073
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.58653930178589E-01,  1.93662286888290E-01)
-X( 2) = (  1.98601701320130E-01, -9.74481187756870E-02)
-X( 3) = (  7.79115663174116E-01,  1.29436096385436E-01)
-X( 4) = (  5.22497198282524E-01, -2.00177019549988E-01)
-
-X( 5) = ( -1.69654946764199E-01,  7.30094165575539E-01)
-
-PATH NUMBER =      2074
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.45969594546543E-01,  3.61894933080801E-01)
-X( 2) = ( -2.02751686603174E-01, -4.80673558070250E-02)
-X( 3) = (  1.04969962058490E+00,  3.37274594106990E-01)
-X( 4) = (  4.50363451549769E-01, -1.49427927293987E-01)
-
-X( 5) = ( -2.21870341492999E-02,  5.85194172718528E-01)
-
-PATH NUMBER =      2075
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.74204023173976E-01,  3.06085667723197E-01)
-X( 2) = ( -5.41947561741921E-01, -2.68224481600721E-01)
-X( 3) = (  1.12338294640529E+00,  6.70416135556381E-01)
-X( 4) = (  3.62484907998794E-01, -1.56918545818028E-01)
-
-X( 5) = (  1.04481967359718E-01,  5.14833976944882E-01)
-
-PATH NUMBER =      2076
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.18977267898678E+00,  5.23482663271975E-02)
-X( 2) = ( -6.60272404376448E-01, -6.54905530223997E-01)
-X( 3) = (  9.65688393584978E-01,  9.72980091033622E-01)
-X( 4) = (  2.99980914818322E-01, -2.19143931465759E-01)
-
-X( 5) = (  2.29714431056750E-01,  4.76660090486975E-01)
-
-PATH NUMBER =      2077
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.19180859215140E+00, -2.80590721016909E-01)
-X( 2) = ( -5.02360705603915E-01, -1.02717814154486E+00)
-X( 3) = (  6.50402995968330E-01,  1.10339342314711E+00)
-X( 4) = (  2.92097785072003E-01, -3.06988134734478E-01)
-
-X( 5) = (  3.78564895310293E-01,  4.64530929833822E-01)
-
-PATH NUMBER =      2078
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.79359136271447E-01, -5.36945441926134E-01)
-X( 2) = ( -1.42101104273034E-01, -1.21085182337706E+00)
-X( 3) = (  3.25052295107055E-01,  1.00063428441820E+00)
-X( 4) = (  3.42524122779368E-01, -3.79347876635179E-01)
-
-X( 5) = (  5.95059159667716E-01,  5.09038366062875E-01)
-
-PATH NUMBER =      2079
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.51831772865862E-01, -5.96764673421686E-01)
-X( 2) = (  2.51936928313991E-01, -1.11998361868572E+00)
-X( 3) = (  1.41871499804414E-01,  7.12784817898762E-01)
-X( 4) = (  4.27664884100822E-01, -4.02365229743572E-01)
-
-X( 5) = (  9.36134921120691E-01,  8.14046401040004E-01)
-
-PATH NUMBER =      2080
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.79454699733053E-01, -7.18173269797384E-01)
-X( 2) = (  3.64892210285529E-01, -8.26947326434495E-01)
-X( 3) = ( -4.60102599508482E-02,  4.06960997689060E-01)
-X( 4) = (  6.14050673582193E-01, -3.30521354385306E-02)
-
-X( 5) = (  2.12157147746451E+00, -4.02588526863912E-01)
-
-PATH NUMBER =      2081
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.63669726985567E-01, -4.06009283530555E-01)
-X( 2) = (  3.43828484093395E-01, -4.23116518808598E-01)
-X( 3) = (  2.05657115090036E-01,  1.76578594968580E-01)
-X( 4) = (  6.51502879425803E-01,  4.67982249862112E-02)
-
-X( 5) = (  1.68589043579445E+00,  3.84890227706989E+00)
-
-PATH NUMBER =      2082
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.75628434578351E-01, -9.24526506390039E-02)
-X( 2) = (  6.81152941408956E-02, -1.27303674876664E-01)
-X( 3) = (  5.46532463212984E-01,  1.61864106010773E-01)
-X( 4) = (  6.28866111284821E-01,  1.32040963742335E-01)
-
-X( 5) = (  3.37628180462208E-02,  1.46509453426740E+00)
-
-PATH NUMBER =      2083
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.62944098946305E-01,  7.57799955535063E-02)
-X( 2) = ( -3.33238093782409E-01, -7.79229119080016E-02)
-X( 3) = (  8.17116420623763E-01,  3.69702603732326E-01)
-X( 4) = (  5.56732364552065E-01,  1.82790055998335E-01)
-
-X( 5) = (  2.02391585495728E-01,  8.71210634451346E-01)
-
-PATH NUMBER =      2084
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.91178527573738E-01,  1.99707301959033E-02)
-X( 2) = ( -6.72433968921155E-01, -2.98080037701698E-01)
-X( 3) = (  8.90799746444155E-01,  7.02844145181717E-01)
-X( 4) = (  4.68853821001090E-01,  1.75299437474295E-01)
-
-X( 5) = (  3.40842736661414E-01,  6.11012942422271E-01)
-
-PATH NUMBER =      2085
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.10674718338654E+00, -2.33766671200096E-01)
-X( 2) = ( -7.90758811555682E-01, -6.84761086324973E-01)
-X( 3) = (  7.33105193623847E-01,  1.00540810065896E+00)
-X( 4) = (  4.06349827820618E-01,  1.13074051826564E-01)
-
-X( 5) = (  4.60225552870714E-01,  4.38798761842327E-01)
-
-PATH NUMBER =      2086
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.10878309655116E+00, -5.66705658544204E-01)
-X( 2) = ( -6.32847112783149E-01, -1.05703369764584E+00)
-X( 3) = (  4.17819796007198E-01,  1.13582143277244E+00)
-X( 4) = (  3.98466698074299E-01,  2.52298485578452E-02)
-
-X( 5) = (  5.86420716542246E-01,  2.89072340581799E-01)
-
-PATH NUMBER =      2087
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.96333640671209E-01, -8.23060379453430E-01)
-X( 2) = ( -2.72587511452269E-01, -1.24070737947804E+00)
-X( 3) = (  9.24690951459225E-02,  1.03306229404353E+00)
-X( 4) = (  4.48893035781664E-01, -4.71298933428563E-02)
-
-X( 5) = (  7.55722343139169E-01,  1.24841574451540E-01)
-
-PATH NUMBER =      2088
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.68806277265623E-01, -8.82879610948980E-01)
-X( 2) = (  1.21450521134758E-01, -1.14983917478670E+00)
-X( 3) = ( -9.07117001567180E-02,  7.45212827524098E-01)
-X( 4) = (  5.34033797103118E-01, -7.01472464512488E-02)
-
-X( 5) = (  1.07020676703701E+00, -1.02159123110915E-01)
-
-PATH NUMBER =      2089
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.19423434025079E-02, -8.83982267923584E-01)
-X( 2) = (  2.84124604705325E-01, -9.33693055049200E-01)
-X( 3) = ( -2.45023650637866E-01,  2.82300695107696E-01)
-X( 4) = (  4.81988384932853E-01,  2.89814223900448E-01)
-
-X( 5) = (  4.47520425797741E-01, -1.13310349427417E+00)
-
-PATH NUMBER =      2090
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.38426293449774E-02, -5.71818281656755E-01)
-X( 2) = (  2.63060878513191E-01, -5.29862247423302E-01)
-X( 3) = (  6.64372440301842E-03,  5.19182923872155E-02)
-X( 4) = (  5.19440590776463E-01,  3.69664584325190E-01)
-
-X( 5) = ( -2.70644552541257E-01, -2.14391323335007E+00)
-
-PATH NUMBER =      2091
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.81160782478059E-02, -2.58261648765204E-01)
-X( 2) = ( -1.26523114393081E-02, -2.34049403491368E-01)
-X( 3) = (  3.47519072525967E-01,  3.72038034294085E-02)
-X( 4) = (  4.96803822635481E-01,  4.54907323081313E-01)
-
-X( 5) = ( -7.25116566217177E+00,  2.67295141817527E-01)
-
-PATH NUMBER =      2092
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.15431742615760E-01, -9.00290025726937E-02)
-X( 2) = ( -4.14005699362613E-01, -1.84668640522706E-01)
-X( 3) = (  6.18103029936746E-01,  2.45042301150962E-01)
-X( 4) = (  4.24670075902725E-01,  5.05656415337314E-01)
-
-X( 5) = (  5.54296236943755E-01,  2.29356133005957E+00)
-
-PATH NUMBER =      2093
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.43666171243193E-01, -1.45838267930297E-01)
-X( 2) = ( -7.53201574501359E-01, -4.04825766316403E-01)
-X( 3) = (  6.91786355757137E-01,  5.78183842600353E-01)
-X( 4) = (  3.36791532351750E-01,  4.98165796813274E-01)
-
-X( 5) = (  8.74376207351582E-01,  9.19880220312455E-01)
-
-PATH NUMBER =      2094
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.59234827055995E-01, -3.99575669326296E-01)
-X( 2) = ( -8.71526417135886E-01, -7.91506814939678E-01)
-X( 3) = (  5.34091802936830E-01,  8.80747798077594E-01)
-X( 4) = (  2.74287539171278E-01,  4.35940411165543E-01)
-
-X( 5) = (  8.66665333520937E-01,  3.59149645639597E-01)
-
-PATH NUMBER =      2095
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.61270740220612E-01, -7.32514656670403E-01)
-X( 2) = ( -7.13614718363353E-01, -1.16377942626054E+00)
-X( 3) = (  2.18806405320181E-01,  1.01116113019108E+00)
-X( 4) = (  2.66404409424959E-01,  3.48096207896824E-01)
-
-X( 5) = (  8.20710702266933E-01, -5.67382903526082E-04)
-
-PATH NUMBER =      2096
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.48821284340664E-01, -9.88869377579629E-01)
-X( 2) = ( -3.53355117032472E-01, -1.34745310809274E+00)
-X( 3) = ( -1.06544295541094E-01,  9.08401991462168E-01)
-X( 4) = (  3.16830747132324E-01,  2.75736465996122E-01)
-
-X( 5) = (  7.54912129543012E-01, -3.08929453279900E-01)
-
-PATH NUMBER =      2097
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.21293920935078E-01, -1.04868860907518E+00)
-X( 2) = (  4.06829155545535E-02, -1.25658490340140E+00)
-X( 3) = ( -2.89725090843735E-01,  6.20552524942734E-01)
-X( 4) = (  4.01971508453778E-01,  2.52719112887729E-01)
-
-X( 5) = (  6.53140134524869E-01, -6.47206473780440E-01)
-
-PATH NUMBER =      2098
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.64243091337851E-01, -8.51901453663691E-01)
-X( 2) = (  2.90867861007079E-01, -1.06738144341219E+00)
-X( 3) = ( -3.17346654760846E-01,  5.88820213423899E-02)
-X( 4) = (  1.73288307199754E-01,  4.52256201491485E-01)
-
-X( 5) = ( -1.71644963800454E-01, -8.08503487470320E-01)
-
-PATH NUMBER =      2099
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.80028064085336E-01, -5.39737467396861E-01)
-X( 2) = (  2.69804134814945E-01, -6.63550635786288E-01)
-X( 3) = ( -6.56792797199616E-02, -1.71500381378090E-01)
-X( 4) = (  2.10740513043365E-01,  5.32106561916227E-01)
-
-X( 5) = ( -5.32945445570661E-01, -7.67196368841703E-01)
-
-PATH NUMBER =      2100
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.68069356492552E-01, -2.26180834505311E-01)
-X( 2) = ( -5.90905513755460E-03, -3.67737791854354E-01)
-X( 3) = (  2.75196068402987E-01, -1.86214870335898E-01)
-X( 4) = (  1.88103744902382E-01,  6.17349300672351E-01)
-
-X( 5) = ( -1.06393134032218E+00, -6.39417037008059E-01)
-
-PATH NUMBER =      2101
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.92463078754013E-02, -5.79481883128004E-02)
-X( 2) = ( -4.07262443060859E-01, -3.18357028885692E-01)
-X( 3) = (  5.45780025813766E-01,  2.16236273856558E-02)
-X( 4) = (  1.15969998169627E-01,  6.68098392928351E-01)
-
-X( 5) = ( -2.20569622264936E+00, -3.95320406317564E-02)
-
-PATH NUMBER =      2102
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.47480736502835E-01, -1.13757453670404E-01)
-X( 2) = ( -7.46458318199606E-01, -5.38514154679388E-01)
-X( 3) = (  6.19463351634157E-01,  3.54765168835047E-01)
-X( 4) = (  2.80914546186516E-02,  6.60607774404311E-01)
-
-X( 5) = ( -4.33516864030552E-01,  6.59246628078371E+00)
-
-PATH NUMBER =      2103
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.63049392315637E-01, -3.67494855066403E-01)
-X( 2) = ( -8.64783160834132E-01, -9.25195203302664E-01)
-X( 3) = (  4.61768798813849E-01,  6.57329124312288E-01)
-X( 4) = ( -3.44125385618202E-02,  5.98382388756580E-01)
-
-X( 5) = (  2.31327011586077E+00, -6.41915428798675E-02)
-
-PATH NUMBER =      2104
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.65085305480253E-01, -7.00433842410510E-01)
-X( 2) = ( -7.06871462061599E-01, -1.29746781462353E+00)
-X( 3) = (  1.46483401197200E-01,  7.87742456425773E-01)
-X( 4) = ( -4.22956683081395E-02,  5.10538185487861E-01)
-
-X( 5) = (  1.07317374694733E+00, -6.78572726286671E-01)
-
-PATH NUMBER =      2105
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.52635849600306E-01, -9.56788563319736E-01)
-X( 2) = ( -3.46611860730719E-01, -1.48114149645573E+00)
-X( 3) = ( -1.78867299664074E-01,  6.84983317696862E-01)
-X( 4) = (  8.13066939922524E-03,  4.38178443587159E-01)
-
-X( 5) = (  5.19189661566872E-01, -7.89134419276006E-01)
-
-PATH NUMBER =      2106
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.51084861947196E-02, -1.01660779481529E+00)
-X( 2) = (  4.74261718563073E-02, -1.39027329176439E+00)
-X( 3) = ( -3.62048094966715E-01,  3.97133851177428E-01)
-X( 4) = (  9.32714307206799E-02,  4.15161090478767E-01)
-
-X( 5) = (  1.51140906588602E-01, -8.15465655593819E-01)
-
-PATH NUMBER =      2107
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.51271369715368E-01, -5.75174516849003E-01)
-X( 2) = (  6.33465331938189E-01, -1.32659068373057E+00)
-X( 3) = ( -2.38128410866734E-01,  3.69569580363696E-01)
-X( 4) = ( -1.23279773753252E-01,  1.19839951753880E-01)
-
-X( 5) = ( -8.14327554270050E-01, -1.72227219717424E-01)
-
-PATH NUMBER =      2108
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.67056342462853E-01, -2.63010530582174E-01)
-X( 2) = (  6.12401605746055E-01, -9.22759876104676E-01)
-X( 3) = (  1.35389641741500E-02,  1.39187177643216E-01)
-X( 4) = ( -8.58275679096419E-02,  1.99690312178622E-01)
-
-X( 5) = ( -6.50645785484134E-01,  2.36220849699679E-02)
-
-PATH NUMBER =      2109
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.55097634870070E-01,  5.05461023093772E-02)
-X( 2) = (  3.36688415793556E-01, -6.26947032172742E-01)
-X( 3) = (  3.54414312297098E-01,  1.24472688685409E-01)
-X( 4) = ( -1.08464336050624E-01,  2.84933050934745E-01)
-
-X( 5) = ( -5.61139257383865E-01,  1.80686013581202E-01)
-
-PATH NUMBER =      2110
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.67781970502116E-01,  2.18778748501888E-01)
-X( 2) = ( -6.46649721297483E-02, -5.77566269204080E-01)
-X( 3) = (  6.24998269707877E-01,  3.32311186406962E-01)
-X( 4) = ( -1.80598082783380E-01,  3.35682143190746E-01)
-
-X( 5) = ( -4.99752216325886E-01,  3.36261089338363E-01)
-
-PATH NUMBER =      2111
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.60452458125318E-01,  1.62969483144284E-01)
-X( 2) = ( -4.03860847268495E-01, -7.97723394997776E-01)
-X( 3) = (  6.98681595528269E-01,  6.65452727856353E-01)
-X( 4) = ( -2.68476626334355E-01,  3.28191524666705E-01)
-
-X( 5) = ( -4.55253635752574E-01,  5.29258217115431E-01)
-
-PATH NUMBER =      2112
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.76021113938120E-01, -9.07679182517153E-02)
-X( 2) = ( -5.22185689903022E-01, -1.18440444362105E+00)
-X( 3) = (  5.40987042707961E-01,  9.68016683333594E-01)
-X( 4) = ( -3.30980619514827E-01,  2.65966139018974E-01)
-
-X( 5) = ( -4.49894488583744E-01,  8.43573322899412E-01)
-
-PATH NUMBER =      2113
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.78057027102737E-01, -4.23706905595822E-01)
-X( 2) = ( -3.64273991130489E-01, -1.55667705494192E+00)
-X( 3) = (  2.25701645091312E-01,  1.09843001544708E+00)
-X( 4) = ( -3.38863749261146E-01,  1.78121935750255E-01)
-
-X( 5) = ( -7.80909664117909E-01,  1.55278470259625E+00)
-
-PATH NUMBER =      2114
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.65607571222789E-01, -6.80061626505048E-01)
-X( 2) = ( -4.01438979960877E-03, -1.74035073677412E+00)
-X( 3) = ( -9.96490557699629E-02,  9.95670876718168E-01)
-X( 4) = ( -2.88437411553781E-01,  1.05762193849554E-01)
-
-X( 5) = ( -2.85905952042335E+00,  4.21962760840529E-01)
-
-PATH NUMBER =      2115
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.61919792182797E-01, -7.39880858000599E-01)
-X( 2) = (  3.90023642787417E-01, -1.64948253208278E+00)
-X( 3) = ( -2.82829851072604E-01,  7.07821410198735E-01)
-X( 4) = ( -2.03296650232327E-01,  8.27448407411613E-02)
-
-X( 5) = ( -1.26004434888952E+00, -4.48354167152760E-01)
-
-PATH NUMBER =      2116
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.71109996103431E-01, -2.77918029453105E-01)
-X( 2) = (  7.66293647454104E-01, -1.34316461765852E+00)
-X( 3) = ( -3.06627266443088E-02,  2.59549079626144E-01)
-X( 4) = ( -3.36859098643533E-01, -1.55962524767851E-01)
-
-X( 5) = ( -5.83235848618262E-01,  7.71283688877376E-02)
-
-PATH NUMBER =      2117
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.86894968850916E-01,  3.42459568137244E-02)
-X( 2) = (  7.45229921261971E-01, -9.39333810032622E-01)
-X( 3) = (  2.21004648396575E-01,  2.91666769056633E-02)
-X( 4) = ( -2.99406892799923E-01, -7.61121643431093E-02)
-
-X( 5) = ( -4.58608850053213E-01,  1.18245596785403E-01)
-
-PATH NUMBER =      2118
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.74936261258133E-01,  3.47802589705275E-01)
-X( 2) = (  4.69516731309472E-01, -6.43520966100688E-01)
-X( 3) = (  5.61879996519524E-01,  1.44521879478564E-02)
-X( 4) = ( -3.22043660940905E-01,  9.13057441301408E-03)
-
-X( 5) = ( -3.86550378575225E-01,  1.80390328920351E-01)
-
-PATH NUMBER =      2119
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87620596890179E-01,  5.16035235897786E-01)
-X( 2) = (  6.81633433861675E-02, -5.94140203132026E-01)
-X( 3) = (  8.32463953930303E-01,  2.22290685669409E-01)
-X( 4) = ( -3.94177407673660E-01,  5.98796666690144E-02)
-
-X( 5) = ( -3.42103495232647E-01,  2.53482454333415E-01)
-
-PATH NUMBER =      2120
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.40613831737255E-01,  4.60225970540182E-01)
-X( 2) = ( -2.71032531752580E-01, -8.14297328925722E-01)
-X( 3) = (  9.06147279750694E-01,  5.55432227118801E-01)
-X( 4) = ( -4.82055951224636E-01,  5.23890481449741E-02)
-
-X( 5) = ( -3.20131572638717E-01,  3.45322882574957E-01)
-
-PATH NUMBER =      2121
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.56182487550057E-01,  2.06488569144183E-01)
-X( 2) = ( -3.89357374387107E-01, -1.20097837754900E+00)
-X( 3) = (  7.48452726930387E-01,  8.57996182596042E-01)
-X( 4) = ( -5.44559944405108E-01, -9.83633750275674E-03)
-
-X( 5) = ( -3.39849308903655E-01,  4.72981161867583E-01)
-
-PATH NUMBER =      2122
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.58218400714674E-01, -1.26450418199924E-01)
-X( 2) = ( -2.31445675614573E-01, -1.57325098886986E+00)
-X( 3) = (  4.33167329313737E-01,  9.88409514709527E-01)
-X( 4) = ( -5.52443074151426E-01, -9.76805407714758E-02)
-
-X( 5) = ( -4.92042886571686E-01,  6.31214715021031E-01)
-
-PATH NUMBER =      2123
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.45768944834726E-01, -3.82805139109150E-01)
-X( 2) = (  1.28813925716307E-01, -1.75692467070206E+00)
-X( 3) = (  1.07816628452462E-01,  8.85650375980616E-01)
-X( 4) = ( -5.02016736444061E-01, -1.70040282672177E-01)
-
-X( 5) = ( -8.53417946264601E-01,  5.22840419912960E-01)
-
-PATH NUMBER =      2124
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.81758418570860E-01, -4.42624370604701E-01)
-X( 2) = (  5.22851958303333E-01, -1.66605646601072E+00)
-X( 3) = ( -7.53641668501786E-02,  5.97800909461182E-01)
-X( 4) = ( -4.16875975122607E-01, -1.93057635780569E-01)
-
-X( 5) = ( -7.97284270970502E-01,  1.44986477830561E-01)
-
-PATH NUMBER =      2125
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.95234478610094E-01, -3.74543258669630E-02)
-X( 2) = (  8.78699559816573E-01, -1.27048059221548E+00)
-X( 3) = (  1.98985022577764E-01,  3.08624857660289E-01)
-X( 4) = ( -3.23187939011804E-01, -5.04525623030464E-01)
-
-X( 5) = ( -4.46162562612231E-01,  2.29461780025238E-01)
-
-PATH NUMBER =      2126
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.11019451357579E-01,  2.74709660399866E-01)
-X( 2) = (  8.57635833624439E-01, -8.66649784589581E-01)
-X( 3) = (  4.50652397618648E-01,  7.82424549398091E-02)
-X( 4) = ( -2.85735733168194E-01, -4.24675262605722E-01)
-
-X( 5) = ( -3.53925506374307E-01,  2.01852621920546E-01)
-
-PATH NUMBER =      2127
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.99060743764796E-01,  5.88266293291417E-01)
-X( 2) = (  5.81922643671940E-01, -5.70836940657647E-01)
-X( 3) = (  7.91527745741596E-01,  6.35279659820022E-02)
-X( 4) = ( -3.08372501309176E-01, -3.39432523849599E-01)
-
-X( 5) = ( -2.86695315882662E-01,  2.17783921892608E-01)
-
-PATH NUMBER =      2128
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17450793968421E-02,  7.56498939483927E-01)
-X( 2) = (  1.80569255748636E-01, -5.21456177688985E-01)
-X( 3) = (  1.06211170315238E+00,  2.71366463703555E-01)
-X( 4) = ( -3.80506248041931E-01, -2.88683431593598E-01)
-
-X( 5) = ( -2.39212467095551E-01,  2.52844480294368E-01)
-
-PATH NUMBER =      2129
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.16489349230592E-01,  7.00689674126323E-01)
-X( 2) = ( -1.58626619390111E-01, -7.41613303482681E-01)
-X( 3) = (  1.13579502897277E+00,  6.04508005152947E-01)
-X( 4) = ( -4.68384791592907E-01, -2.96174050117638E-01)
-
-X( 5) = ( -2.07204945898384E-01,  3.03957952235283E-01)
-
-PATH NUMBER =      2130
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.32058005043394E-01,  4.46952272730324E-01)
-X( 2) = ( -2.76951462024638E-01, -1.12829435210596E+00)
-X( 3) = (  9.78100476152459E-01,  9.07071960630188E-01)
-X( 4) = ( -5.30888784773379E-01, -3.58399435765369E-01)
-
-X( 5) = ( -1.97122075239325E-01,  3.76971509504641E-01)
-
-PATH NUMBER =      2131
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.34093918208010E-01,  1.14013285386217E-01)
-X( 2) = ( -1.19039763252105E-01, -1.50056696342682E+00)
-X( 3) = (  6.62815078535810E-01,  1.03748529274367E+00)
-X( 4) = ( -5.38771914519698E-01, -4.46243639034088E-01)
-
-X( 5) = ( -2.42031452446157E-01,  4.73614486528969E-01)
-
-PATH NUMBER =      2132
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.21644462328062E-01, -1.42341435523009E-01)
-X( 2) = (  2.41219838078776E-01, -1.68424064525902E+00)
-X( 3) = (  3.37464377674535E-01,  9.34726154014762E-01)
-X( 4) = ( -4.88345576812333E-01, -5.18603380934790E-01)
-
-X( 5) = ( -4.00030236735728E-01,  5.15578265493839E-01)
-
-PATH NUMBER =      2133
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.88290107752365E-03, -2.02160667018560E-01)
-X( 2) = (  6.35257870665802E-01, -1.59337244056768E+00)
-X( 3) = (  1.54283582371894E-01,  6.46876687495328E-01)
-X( 4) = ( -4.03204815490879E-01, -5.41620734043183E-01)
-
-X( 5) = ( -5.16228028480484E-01,  3.60760449943307E-01)
-
-PATH NUMBER =      2134
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.93892650914020E-03,  3.37009545450846E-02)
-X( 2) = (  9.18087093378633E-01, -1.14254827069921E+00)
-X( 3) = (  3.43360102688038E-01,  4.93833812507437E-01)
-X( 4) = ( -8.86631823877666E-02, -7.62752795509551E-01)
-
-X( 5) = ( -3.33582679452085E-01,  3.57147815350878E-01)
-
-PATH NUMBER =      2135
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21723899256626E-01,  3.45864940811914E-01)
-X( 2) = (  8.97023367186499E-01, -7.38717463073316E-01)
-X( 3) = (  5.95027477728922E-01,  2.63451409786957E-01)
-X( 4) = ( -5.12109765441563E-02, -6.82902435084809E-01)
-
-X( 5) = ( -2.77738051083858E-01,  2.84619158883679E-01)
-
-PATH NUMBER =      2136
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.76519166384171E-03,  6.59421573703465E-01)
-X( 2) = (  6.21310177234000E-01, -4.42904619141382E-01)
-X( 3) = (  9.35902825851870E-01,  2.48736920829150E-01)
-X( 4) = ( -7.38477446851388E-02, -5.97659696328686E-01)
-
-X( 5) = ( -2.16095666979476E-01,  2.66465226229803E-01)
-
-PATH NUMBER =      2137
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.77550472704112E-01,  8.27654219895975E-01)
-X( 2) = (  2.19956789310696E-01, -3.93523856172719E-01)
-X( 3) = (  1.20648678326265E+00,  4.56575418550703E-01)
-X( 4) = ( -1.45981491417894E-01, -5.46910604072685E-01)
-
-X( 5) = ( -1.65002619722107E-01,  2.75653972687283E-01)
-
-PATH NUMBER =      2138
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.05784901331545E-01,  7.71844954538371E-01)
-X( 2) = ( -1.19239085828051E-01, -6.13680981966416E-01)
-X( 3) = (  1.28017010908304E+00,  7.89716960000094E-01)
-X( 4) = ( -2.33860034968869E-01, -5.54401222596725E-01)
-
-X( 5) = ( -1.23657937610975E-01,  3.02877755338272E-01)
-
-PATH NUMBER =      2139
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.21353557144347E-01,  5.18107553142372E-01)
-X( 2) = ( -2.37563928462578E-01, -1.00036203058969E+00)
-X( 3) = (  1.12247555626273E+00,  1.09228091547734E+00)
-X( 4) = ( -2.96364028149341E-01, -6.16626608244456E-01)
-
-X( 5) = ( -9.36175332345812E-02,  3.49918088060247E-01)
-
-PATH NUMBER =      2140
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.23389470308964E-01,  1.85168565798266E-01)
-X( 2) = ( -7.96522296900452E-02, -1.37263464191055E+00)
-X( 3) = (  8.07190158646084E-01,  1.22269424759082E+00)
-X( 4) = ( -3.04247157895660E-01, -7.04470811513175E-01)
-
-X( 5) = ( -9.00386324738518E-02,  4.23738552607472E-01)
-
-PATH NUMBER =      2141
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.10940014429016E-01, -7.11861551109608E-02)
-X( 2) = (  2.80607371640836E-01, -1.55630832374276E+00)
-X( 3) = (  4.81839457784809E-01,  1.11993510886191E+00)
-X( 4) = ( -2.53820820188295E-01, -7.76830553413877E-01)
-
-X( 5) = ( -1.59303716061585E-01,  5.07221430638893E-01)
-
-PATH NUMBER =      2142
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.83412651023430E-01, -1.31005386606512E-01)
-X( 2) = (  6.74645404227862E-01, -1.46544011905141E+00)
-X( 3) = (  2.98658662482168E-01,  8.32085642342475E-01)
-X( 4) = ( -1.68680058866841E-01, -7.99847906522269E-01)
-
-X( 5) = ( -2.99876796741055E-01,  4.83745173489148E-01)
-
-PATH NUMBER =      2143
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.61412056209468E-01, -9.77465347246134E-02)
-X( 2) = (  8.66026383442921E-01, -1.01922860815656E+00)
-X( 3) = (  3.34907809152630E-01,  7.28514615826354E-01)
-X( 4) = (  2.56978431151854E-01, -8.09816678326798E-01)
-
-X( 5) = ( -2.13767958436805E-01,  4.95676798292630E-01)
-
-PATH NUMBER =      2144
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.45627083461982E-01,  2.14417451542216E-01)
-X( 2) = (  8.44962657250787E-01, -6.15397800530665E-01)
-X( 3) = (  5.86575184193514E-01,  4.98132213105873E-01)
-X( 4) = (  2.94430636995464E-01, -7.29966317902057E-01)
-
-X( 5) = ( -2.09547657753448E-01,  3.84436864752350E-01)
-
-PATH NUMBER =      2145
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.57585791054766E-01,  5.27974084433766E-01)
-X( 2) = (  5.69249467298288E-01, -3.19584956598731E-01)
-X( 3) = (  9.27450532316462E-01,  4.83417724148066E-01)
-X( 4) = (  2.71793868854482E-01, -6.44723579145933E-01)
-
-X( 5) = ( -1.56915320822710E-01,  3.30404109215941E-01)
-
-PATH NUMBER =      2146
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.44901455422719E-01,  6.96206730626277E-01)
-X( 2) = (  1.67896079374984E-01, -2.70204193630069E-01)
-X( 3) = (  1.19803448972724E+00,  6.91256221869619E-01)
-X( 4) = (  1.99660122121726E-01, -5.93974486889932E-01)
-
-X( 5) = ( -1.02256831910701E-01,  3.14391143034308E-01)
-
-PATH NUMBER =      2147
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.73135884050153E-01,  6.40397465268673E-01)
-X( 2) = ( -1.71299795763763E-01, -4.90361319423766E-01)
-X( 3) = (  1.27171781554763E+00,  1.02439776331901E+00)
-X( 4) = (  1.11781578570751E-01, -6.01465105413973E-01)
-
-X( 5) = ( -5.20533011560438E-02,  3.20981649883977E-01)
-
-PATH NUMBER =      2148
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.08870453986296E+00,  3.86660063872675E-01)
-X( 2) = ( -2.89624638398290E-01, -8.77042368047041E-01)
-X( 3) = (  1.11402326272733E+00,  1.32696171879625E+00)
-X( 4) = (  4.92775853902790E-02, -6.63690491061704E-01)
-
-X( 5) = ( -6.10520970875994E-03,  3.48010999470993E-01)
-
-PATH NUMBER =      2149
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.09074045302757E+00,  5.37210765285674E-02)
-X( 2) = ( -1.31712939625757E-01, -1.24931497936790E+00)
-X( 3) = (  7.98737865110676E-01,  1.45737505090974E+00)
-X( 4) = (  4.13944556439601E-02, -7.51534694330423E-01)
-
-X( 5) = (  3.00369296348212E-02,  4.03664028906154E-01)
-
-PATH NUMBER =      2150
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.78290997147624E-01, -2.02633644380658E-01)
-X( 2) = (  2.28546661705124E-01, -1.43298866120011E+00)
-X( 3) = (  4.73387164249401E-01,  1.35461591218083E+00)
-X( 4) = (  9.18207933513248E-02, -8.23894436231125E-01)
-
-X( 5) = (  2.48118315273368E-02,  4.98719717137408E-01)
-
-PATH NUMBER =      2151
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.50763633742038E-01, -2.62452875876210E-01)
-X( 2) = (  6.22584694292150E-01, -1.34212045650876E+00)
-X( 3) = (  2.90206368946761E-01,  1.06676644566139E+00)
-X( 4) = (  1.76961554672780E-01, -8.46911789339517E-01)
-
-X( 5) = ( -8.88530335893281E-02,  5.74844773160147E-01)
-
-PATH NUMBER =      2152
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.81721973456489E-01, -3.70291052570649E-01)
-X( 2) = (  7.46877214778699E-01, -9.58224245236618E-01)
-X( 3) = (  1.77583064053537E-01,  9.02857511557514E-01)
-X( 4) = (  5.52007349253223E-01, -6.23695557655223E-01)
-
-X( 5) = ( -4.53451002827589E-02,  6.95184243886149E-01)
-
-PATH NUMBER =      2153
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.65937000709004E-01, -5.81270663038195E-02)
-X( 2) = (  7.25813488586565E-01, -5.54393437610721E-01)
-X( 3) = (  4.29250439094421E-01,  6.72475108837034E-01)
-X( 4) = (  5.89459555096834E-01, -5.43845197230481E-01)
-
-X( 5) = ( -1.40601367367664E-01,  5.39137981514110E-01)
-
-PATH NUMBER =      2154
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.77895708301787E-01,  2.55429566587731E-01)
-X( 2) = (  4.50100298634066E-01, -2.58580593678786E-01)
-X( 3) = (  7.70125787217369E-01,  6.57760619879227E-01)
-X( 4) = (  5.66822786955852E-01, -4.58602458474357E-01)
-
-X( 5) = ( -1.03882258535444E-01,  4.29218327906103E-01)
-
-PATH NUMBER =      2155
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.65211372669741E-01,  4.23662212780242E-01)
-X( 2) = (  4.87469107107615E-02, -2.09199830710124E-01)
-X( 3) = (  1.04070974462815E+00,  8.65599117600780E-01)
-X( 4) = (  4.94689040223097E-01, -4.07853366218356E-01)
-
-X( 5) = ( -4.28877752780964E-02,  3.78612528253549E-01)
-
-PATH NUMBER =      2156
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.93445801297175E-01,  3.67852947422638E-01)
-X( 2) = ( -2.90448964427985E-01, -4.29356956503821E-01)
-X( 3) = (  1.11439307044854E+00,  1.19874065905017E+00)
-X( 4) = (  4.06810496672121E-01, -4.15343984742396E-01)
-
-X( 5) = (  1.92631258086236E-02,  3.60383114187155E-01)
-
-PATH NUMBER =      2157
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.20901445710998E+00,  1.14115546026639E-01)
-X( 2) = ( -4.08773807062512E-01, -8.16038005127097E-01)
-X( 3) = (  9.56698517628233E-01,  1.50130461452741E+00)
-X( 4) = (  3.44306503491649E-01, -4.77569370390128E-01)
-
-X( 5) = (  8.27404504143349E-02,  3.65298879538112E-01)
-
-PATH NUMBER =      2158
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.21105037027459E+00, -2.18823441317468E-01)
-X( 2) = ( -2.50862108289979E-01, -1.18831061644796E+00)
-X( 3) = (  6.41413120011583E-01,  1.63171794664090E+00)
-X( 4) = (  3.36423373745330E-01, -5.65413573658846E-01)
-
-X( 5) = (  1.49834578047169E-01,  3.99371531185402E-01)
-
-PATH NUMBER =      2159
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.98600914394645E-01, -4.75178162226694E-01)
-X( 2) = (  1.09397493040902E-01, -1.37198429828016E+00)
-X( 3) = (  3.16062419150308E-01,  1.52895880791199E+00)
-X( 4) = (  3.86849711452695E-01, -6.37773315559548E-01)
-
-X( 5) = (  2.08644979960089E-01,  4.88403577017864E-01)
-
-PATH NUMBER =      2160
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.71073550989059E-01, -5.34997393722245E-01)
-X( 2) = (  5.03435525627928E-01, -1.28111609358882E+00)
-X( 3) = (  1.32881623847667E-01,  1.24110934139255E+00)
-X( 4) = (  4.71990472774149E-01, -6.60790668667941E-01)
-
-X( 5) = (  1.72533135618560E-01,  6.53601272492754E-01)
-
-PATH NUMBER =      2161
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.98696477856251E-01, -6.56405990097943E-01)
-X( 2) = (  6.16390807599464E-01, -9.88079801337594E-01)
-X( 3) = ( -5.50001359075944E-02,  9.35285521182851E-01)
-X( 4) = (  6.58376262255520E-01, -2.91477574362900E-01)
-
-X( 5) = (  3.13835013880166E-01,  1.14057194592437E+00)
-
-PATH NUMBER =      2162
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.82911505108766E-01, -3.44242003831114E-01)
-X( 2) = (  5.95327081407331E-01, -5.84248993711697E-01)
-X( 3) = (  1.96667239133289E-01,  7.04903118462371E-01)
-X( 4) = (  6.95828468099131E-01, -2.11627213938158E-01)
-
-X( 5) = ( -1.06363873558317E-01,  8.80510967722593E-01)
-
-PATH NUMBER =      2163
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.94870212701549E-01, -3.06853709395632E-02)
-X( 2) = (  3.19613891454832E-01, -2.88436149779763E-01)
-X( 3) = (  5.37542587256237E-01,  6.90188629504564E-01)
-X( 4) = (  6.73191699958148E-01, -1.26384475182035E-01)
-
-X( 5) = ( -8.41773318204795E-02,  6.20058030982034E-01)
-
-PATH NUMBER =      2164
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.82185877069503E-01,  1.37547275252947E-01)
-X( 2) = ( -8.17394964684729E-02, -2.39055386811101E-01)
-X( 3) = (  8.08126544667017E-01,  8.98027127226117E-01)
-X( 4) = (  6.01057953225393E-01, -7.56353829260340E-02)
-
-X( 5) = (  5.62735148399664E-03,  5.02340136951224E-01)
-
-PATH NUMBER =      2165
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.10420305696937E-01,  8.17380098953439E-02)
-X( 2) = ( -4.20935371607220E-01, -4.59212512604797E-01)
-X( 3) = (  8.81809870487408E-01,  1.23116866867551E+00)
-X( 4) = (  5.13179409674418E-01, -8.31260014500745E-02)
-
-X( 5) = (  9.62459060230663E-02,  4.44358260278673E-01)
-
-PATH NUMBER =      2166
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12598896150974E+00, -1.71999391500656E-01)
-X( 2) = ( -5.39260214241746E-01, -8.45893561228073E-01)
-X( 3) = (  7.24115317667100E-01,  1.53373262415275E+00)
-X( 4) = (  4.50675416493946E-01, -1.45351387097805E-01)
-
-X( 5) = (  1.90248082393363E-01,  4.16473558038110E-01)
-
-PATH NUMBER =      2167
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12802487467436E+00, -5.04938378844763E-01)
-X( 2) = ( -3.81348515469214E-01, -1.21816617254894E+00)
-X( 3) = (  4.08829920050452E-01,  1.66414595626623E+00)
-X( 4) = (  4.42792286747627E-01, -2.33195590366524E-01)
-
-X( 5) = (  3.01003810209576E-01,  4.16122892950857E-01)
-
-PATH NUMBER =      2168
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.15575418794407E-01, -7.61293099753989E-01)
-X( 2) = ( -2.10889141383326E-02, -1.40183985438114E+00)
-X( 3) = (  8.34792191891759E-02,  1.56138681753732E+00)
-X( 4) = (  4.93218624454992E-01, -3.05555332267226E-01)
-
-X( 5) = (  4.48153345157635E-01,  4.72218646264064E-01)
-
-PATH NUMBER =      2169
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.88048055388822E-01, -8.21112331249540E-01)
-X( 2) = (  3.72949118448693E-01, -1.31097164968980E+00)
-X( 3) = ( -9.97015761134642E-02,  1.27353735101789E+00)
-X( 4) = (  5.78359385776446E-01, -3.28572685375618E-01)
-
-X( 5) = (  6.07564817437378E-01,  7.10445040193585E-01)
-
-PATH NUMBER =      2170
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.11841215257062E-02, -8.22214988224143E-01)
-X( 2) = (  5.35623202019261E-01, -1.09482552995230E+00)
-X( 3) = ( -2.54013526594612E-01,  8.10625218601486E-01)
-X( 4) = (  5.26313973606180E-01,  3.13887849760787E-02)
-
-X( 5) = (  2.94579306749884E+00,  5.73730646606150E+00)
-
-PATH NUMBER =      2171
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.46008512217793E-02, -5.10051001957314E-01)
-X( 2) = (  5.14559475827127E-01, -6.90994722326402E-01)
-X( 3) = ( -2.34615155372807E-03,  5.80242815881006E-01)
-X( 4) = (  5.63766179449791E-01,  1.11239145400821E-01)
-
-X( 5) = ( -1.03492810911977E+00,  1.58562475332983E+00)
-
-PATH NUMBER =      2172
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.73578563710041E-02, -1.96494369065763E-01)
-X( 2) = (  2.38846285874628E-01, -3.95181878394468E-01)
-X( 3) = (  3.38529196569220E-01,  5.65528326923199E-01)
-X( 4) = (  5.41129411308808E-01,  1.96481884156944E-01)
-
-X( 5) = ( -3.84816892175942E-01,  9.46790809239522E-01)
-
-PATH NUMBER =      2173
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.34673520738958E-01, -2.82617228732527E-02)
-X( 2) = ( -1.62507102048676E-01, -3.45801115425806E-01)
-X( 3) = (  6.09113153979999E-01,  7.73366824644752E-01)
-X( 4) = (  4.68995664576053E-01,  2.47230976412945E-01)
-
-X( 5) = ( -7.52836328550366E-02,  7.53909959853628E-01)
-
-PATH NUMBER =      2174
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.62907949366391E-01, -8.40709882308561E-02)
-X( 2) = ( -5.01702977187423E-01, -5.65958241219502E-01)
-X( 3) = (  6.82796479800390E-01,  1.10650836609414E+00)
-X( 4) = (  3.81117121025078E-01,  2.39740357888904E-01)
-
-X( 5) = (  1.37775330693254E-01,  6.49919275763978E-01)
-
-PATH NUMBER =      2175
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.78476605179194E-01, -3.37808389626856E-01)
-X( 2) = ( -6.20027819821950E-01, -9.52639289842778E-01)
-X( 3) = (  5.25101926980083E-01,  1.40907232157138E+00)
-X( 4) = (  3.18613127844606E-01,  1.77514972241173E-01)
-
-X( 5) = (  3.30246450868199E-01,  5.73505572836085E-01)
-
-PATH NUMBER =      2176
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.80512518343811E-01, -6.70747376970962E-01)
-X( 2) = ( -4.62116121049417E-01, -1.32491190116364E+00)
-X( 3) = (  2.09816529363435E-01,  1.53948565368487E+00)
-X( 4) = (  3.10729998098287E-01,  8.96707689724542E-02)
-
-X( 5) = (  5.52860195759772E-01,  5.04043669216385E-01)
-
-PATH NUMBER =      2177
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.68063062463862E-01, -9.27102097880188E-01)
-X( 2) = ( -1.01856519718536E-01, -1.50858558299584E+00)
-X( 3) = ( -1.15534171497841E-01,  1.43672651495596E+00)
-X( 4) = (  3.61156335805651E-01,  1.73110270717528E-02)
-
-X( 5) = (  8.96654318398443E-01,  4.33530604785876E-01)
-
-PATH NUMBER =      2178
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.40535699058277E-01, -9.86921329375739E-01)
-X( 2) = (  2.92181512868489E-01, -1.41771737830450E+00)
-X( 3) = ( -2.98714966800481E-01,  1.14887704843653E+00)
-X( 4) = (  4.46297097127106E-01, -5.70632603663988E-03)
-
-X( 5) = (  1.73643199697185E+00,  4.35468874449288E-01)
-
-PATH NUMBER =      2179
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.45001313214652E-01, -7.90134173964250E-01)
-X( 2) = (  5.42366458321014E-01, -1.22851391831528E+00)
-X( 3) = ( -3.26336530717592E-01,  5.87206544836180E-01)
-X( 4) = (  2.17613895873082E-01,  1.93830762567116E-01)
-
-X( 5) = ( -1.54531996221414E+00, -9.04603689296407E-01)
-
-PATH NUMBER =      2180
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.60786285962138E-01, -4.77970187697421E-01)
-X( 2) = (  5.21302732128880E-01, -8.24683110689387E-01)
-X( 3) = ( -7.46691556767081E-02,  3.56824142115700E-01)
-X( 4) = (  2.55066101716692E-01,  2.73681122991858E-01)
-
-X( 5) = ( -1.18760924666226E+00,  3.13237945353373E-02)
-
-PATH NUMBER =      2181
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.48827578369354E-01, -1.64413554805870E-01)
-X( 2) = (  2.45589542176381E-01, -5.28870266757453E-01)
-X( 3) = (  2.66206192446240E-01,  3.42109653157893E-01)
-X( 4) = (  2.32429333575709E-01,  3.58923861747981E-01)
-
-X( 5) = ( -8.48884632660950E-01,  4.48205457250361E-01)
-
-PATH NUMBER =      2182
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.84880859985995E-02,  3.81909138664069E-03)
-X( 2) = ( -1.55763845746923E-01, -4.79489503788791E-01)
-X( 3) = (  5.36790149857019E-01,  5.49948150879446E-01)
-X( 4) = (  1.60295586842954E-01,  4.09672954003982E-01)
-
-X( 5) = ( -5.40370469885422E-01,  7.05761162269123E-01)
-
-PATH NUMBER =      2183
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.66722514626033E-01, -5.19901739709627E-02)
-X( 2) = ( -4.94959720885670E-01, -6.99646629582487E-01)
-X( 3) = (  6.10473475677411E-01,  8.83089692328838E-01)
-X( 4) = (  7.24170432919791E-02,  4.02182335479941E-01)
-
-X( 5) = ( -2.06467042607495E-01,  9.02987255354117E-01)
-
-PATH NUMBER =      2184
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.82291170438836E-01, -3.05727575366962E-01)
-X( 2) = ( -6.13284563520196E-01, -1.08632767820576E+00)
-X( 3) = (  4.52778922857103E-01,  1.18565364780608E+00)
-X( 4) = (  9.91305011150714E-03,  3.39956949832210E-01)
-
-X( 5) = (  2.42030894395232E-01,  1.06959475685576E+00)
-
-PATH NUMBER =      2185
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.84327083603452E-01, -6.38666562711069E-01)
-X( 2) = ( -4.55372864747663E-01, -1.45860028952663E+00)
-X( 3) = (  1.37493525240454E-01,  1.31606697991956E+00)
-X( 4) = (  2.02992036518833E-03,  2.52112746563491E-01)
-
-X( 5) = (  1.03551618230670E+00,  1.14383456394407E+00)
-
-PATH NUMBER =      2186
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.71877627723504E-01, -8.95021283620295E-01)
-X( 2) = ( -9.51132634167831E-02, -1.64227397135883E+00)
-X( 3) = ( -1.87857175620821E-01,  1.21330784119065E+00)
-X( 4) = (  5.24562580725530E-02,  1.79753004662790E-01)
-
-X( 5) = (  2.84105672460668E+00,  1.37443708932327E-01)
-
-PATH NUMBER =      2187
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.43502643179182E-02, -9.54840515115846E-01)
-X( 2) = (  2.98924769170243E-01, -1.55140576666749E+00)
-X( 3) = ( -3.71037970923462E-01,  9.25458374671219E-01)
-X( 4) = (  1.37597019394008E-01,  1.56735651554397E-01)
-
-X( 5) = ( -1.35566382860573E-01, -3.51357935818874E+00)
-
-PATH NUMBER =      2188
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.12066693439458E-01, -7.76919000373769E-01)
-X( 2) = (  1.24689717193200E+00, -9.47416115740999E-01)
-X( 3) = ( -8.99256119517842E-01,  4.20950719009723E-01)
-X( 4) = ( -1.64400902800925E-02,  2.35408186994625E-01)
-
-X( 5) = ( -1.33139187065331E+00,  4.72563472723216E-01)
-
-PATH NUMBER =      2189
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.27851666186944E-01, -4.64755014106940E-01)
-X( 2) = (  1.22583344573987E+00, -5.43585308115101E-01)
-X( 3) = ( -6.47588744476959E-01,  1.90568316289242E-01)
-X( 4) = (  2.10121155635175E-02,  3.15258547419367E-01)
-
-X( 5) = ( -7.62341924704723E-01,  4.01831126902026E-01)
-
-PATH NUMBER =      2190
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.15892958594161E-01, -1.51198381215389E-01)
-X( 2) = (  9.50120255787367E-01, -2.47772464183167E-01)
-X( 3) = ( -3.06713396354010E-01,  1.75853827331435E-01)
-X( 4) = ( -1.62465257746492E-03,  4.00501286175490E-01)
-
-X( 5) = ( -4.95099426743716E-01,  4.49892393168284E-01)
-
-PATH NUMBER =      2191
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.28577294226207E-01,  1.70342649771216E-02)
-X( 2) = (  5.48766867864062E-01, -1.98391701214505E-01)
-X( 3) = ( -3.61294389432304E-02,  3.83692325052988E-01)
-X( 4) = ( -7.37583993102204E-02,  4.51250378431491E-01)
-
-X( 5) = ( -3.16080226823219E-01,  5.13626390655940E-01)
-
-PATH NUMBER =      2192
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.42865598773358E-04, -3.87750003804819E-02)
-X( 2) = (  2.09570992725316E-01, -4.18548827008202E-01)
-X( 3) = (  3.75538868771609E-02,  7.16833866502380E-01)
-X( 4) = ( -1.61636942861196E-01,  4.43759759907450E-01)
-
-X( 5) = ( -1.60636747006698E-01,  5.92888569546805E-01)
-
-PATH NUMBER =      2193
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.15225790214029E-01, -2.92512401776481E-01)
-X( 2) = (  9.12461500907890E-02, -8.05229875631478E-01)
-X( 3) = ( -1.20140665943147E-01,  1.01939782197962E+00)
-X( 4) = ( -2.24140936041668E-01,  3.81534374259719E-01)
-
-X( 5) = (  8.14614085135687E-03,  7.09988008472660E-01)
-
-PATH NUMBER =      2194
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.17261703378646E-01, -6.25451389120588E-01)
-X( 2) = (  2.49157848863322E-01, -1.17750248695234E+00)
-X( 3) = ( -4.35426063559795E-01,  1.14981115409311E+00)
-X( 4) = ( -2.32024065787987E-01,  2.93690170991000E-01)
-
-X( 5) = (  2.35471212243304E-01,  9.41757377784307E-01)
-
-PATH NUMBER =      2195
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.81224749869780E-03, -8.81806110029814E-01)
-X( 2) = (  6.09417450194203E-01, -1.36117616878454E+00)
-X( 3) = ( -7.60776764421071E-01,  1.04705201536419E+00)
-X( 4) = ( -1.81597728080622E-01,  2.21330429090299E-01)
-
-X( 5) = (  5.27606535364435E-01,  1.70257604464265E+00)
-
-PATH NUMBER =      2196
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.22715115906888E-01, -9.41625341525365E-01)
-X( 2) = (  1.00345548278123E+00, -1.27030796409320E+00)
-X( 3) = ( -9.43957559723712E-01,  7.59202548844761E-01)
-X( 4) = ( -9.64569667591669E-02,  1.98313075981906E-01)
-
-X( 5) = ( -2.09627652048634E+00,  2.50949776079484E+00)
-
-PATH NUMBER =      2197
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.31905319827522E-01, -4.79662512977871E-01)
-X( 2) = (  1.37972548744792E+00, -9.63990049668945E-01)
-X( 3) = ( -6.91790435295417E-01,  3.10930218272170E-01)
-X( 4) = ( -2.30019415170374E-01, -4.03942895271062E-02)
-
-X( 5) = ( -6.23846766137842E-01,  3.75456910748344E-01)
-
-PATH NUMBER =      2198
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.47690292575007E-01, -1.67498526711042E-01)
-X( 2) = (  1.35866176125578E+00, -5.60159242043048E-01)
-X( 3) = ( -4.40123060254533E-01,  8.05478155516898E-02)
-X( 4) = ( -1.92567209326763E-01,  3.94560708976357E-02)
-
-X( 5) = ( -4.53807161083534E-01,  2.99107961921251E-01)
-
-PATH NUMBER =      2199
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.35731584982224E-01,  1.46058106180509E-01)
-X( 2) = (  1.08294857130328E+00, -2.64346398111113E-01)
-X( 3) = ( -9.92477121315849E-02,  6.58333265938826E-02)
-X( 4) = ( -2.15203977467746E-01,  1.24698809653759E-01)
-
-X( 5) = ( -3.37216617127189E-01,  3.08158672108211E-01)
-
-PATH NUMBER =      2200
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.48415920614270E-01,  3.14290752373020E-01)
-X( 2) = (  6.81595183379978E-01, -2.14965635142451E-01)
-X( 3) = (  1.71336245279195E-01,  2.73671824315436E-01)
-X( 4) = ( -2.87337724200501E-01,  1.75447901909760E-01)
-
-X( 5) = ( -2.53030992802243E-01,  3.45693983617926E-01)
-
-PATH NUMBER =      2201
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.01814919868365E-02,  2.58481487015416E-01)
-X( 2) = (  3.42399308241231E-01, -4.35122760936148E-01)
-X( 3) = (  2.45019571099586E-01,  6.06813365764827E-01)
-X( 4) = ( -3.75216267751476E-01,  1.67957283385719E-01)
-
-X( 5) = ( -1.85308679441516E-01,  4.04680496131687E-01)
-
-PATH NUMBER =      2202
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.95387163825966E-01,  4.74408561941646E-03)
-X( 2) = (  2.24074465606705E-01, -8.21803809559424E-01)
-X( 3) = (  8.73250182792784E-02,  9.09377321242068E-01)
-X( 4) = ( -4.37720260931948E-01,  1.05731897737988E-01)
-
-X( 5) = ( -1.30665424698581E-01,  4.97685693571037E-01)
-
-PATH NUMBER =      2203
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.97423076990583E-01, -3.28194901724690E-01)
-X( 2) = (  3.81986164379237E-01, -1.19407642088029E+00)
-X( 3) = ( -2.27960379337370E-01,  1.03979065335555E+00)
-X( 4) = ( -4.45603390678267E-01,  1.78876944692694E-02)
-
-X( 5) = ( -1.16461183976335E-01,  6.59327189715745E-01)
-
-PATH NUMBER =      2204
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.50263788893655E-02, -5.84549622633916E-01)
-X( 2) = (  7.42245765710119E-01, -1.37775010271249E+00)
-X( 3) = ( -5.53311080198646E-01,  9.37031514626642E-01)
-X( 4) = ( -3.95177052970903E-01, -5.44720474314323E-02)
-
-X( 5) = ( -3.03335864358902E-01,  8.89257044519791E-01)
-
-PATH NUMBER =      2205
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.42553742294952E-01, -6.44368854129467E-01)
-X( 2) = (  1.13628379829714E+00, -1.28688189802115E+00)
-X( 3) = ( -7.36491875501287E-01,  6.49182048107209E-01)
-X( 4) = ( -3.10036291649448E-01, -7.74894005398246E-02)
-
-X( 5) = ( -7.08065171709792E-01,  7.08481150876347E-01)
-
-PATH NUMBER =      2206
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.56029802334185E-01, -2.39198809391729E-01)
-X( 2) = (  1.49213139981038E+00, -8.91306024225903E-01)
-X( 3) = ( -4.62142686073344E-01,  3.60005996306316E-01)
-X( 4) = ( -2.16348255538645E-01, -3.88957387789719E-01)
-
-X( 5) = ( -3.56140358294004E-01,  3.93563646816374E-01)
-
-PATH NUMBER =      2207
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71814775081670E-01,  7.29651768751002E-02)
-X( 2) = (  1.47106767361825E+00, -4.87475216600006E-01)
-X( 3) = ( -2.10475311032460E-01,  1.29623593585835E-01)
-X( 4) = ( -1.78896049695034E-01, -3.09107027364977E-01)
-
-X( 5) = ( -2.93574599693404E-01,  3.07619919007381E-01)
-
-PATH NUMBER =      2208
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.59856067488886E-01,  3.86521809766651E-01)
-X( 2) = (  1.19535448366575E+00, -1.91662372668072E-01)
-X( 3) = (  1.30400037090488E-01,  1.14909104628028E-01)
-X( 4) = ( -2.01532817836017E-01, -2.23864288608854E-01)
-
-X( 5) = ( -2.24399702693524E-01,  2.85277550052730E-01)
-
-PATH NUMBER =      2209
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.72540403120933E-01,  5.54754455959161E-01)
-X( 2) = (  7.94001095742446E-01, -1.42281609699410E-01)
-X( 3) = (  4.00983994501268E-01,  3.22747602349582E-01)
-X( 4) = ( -2.73666564568772E-01, -1.73115196352853E-01)
-
-X( 5) = ( -1.67239888045712E-01,  2.93432350541610E-01)
-
-PATH NUMBER =      2210
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.55694025506500E-01,  4.98945190601558E-01)
-X( 2) = (  4.54805220603700E-01, -3.62438735493107E-01)
-X( 3) = (  4.74667320321659E-01,  6.55889143798973E-01)
-X( 4) = ( -3.61545108119747E-01, -1.80605814876893E-01)
-
-X( 5) = ( -1.20226812959706E-01,  3.21079810655202E-01)
-
-PATH NUMBER =      2211
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.71262681319303E-01,  2.45207789205558E-01)
-X( 2) = (  3.36480377969173E-01, -7.49119784116383E-01)
-X( 3) = (  3.16972767501351E-01,  9.58453099276214E-01)
-X( 4) = ( -4.24049101300220E-01, -2.42831200524625E-01)
-
-X( 5) = ( -8.37703626903076E-02,  3.70388125310878E-01)
-
-PATH NUMBER =      2212
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.73298594483919E-01, -8.77311981385483E-02)
-X( 2) = (  4.94392076741706E-01, -1.12139239543725E+00)
-X( 3) = (  1.68736988470249E-03,  1.08886643138970E+00)
-X( 4) = ( -4.31932231046538E-01, -3.30675403793343E-01)
-
-X( 5) = ( -7.25701977793148E-02,  4.51389201085736E-01)
-
-PATH NUMBER =      2213
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.60849138603971E-01, -3.44085919047774E-01)
-X( 2) = (  8.54651678072587E-01, -1.30506607726945E+00)
-X( 3) = ( -3.23663330976573E-01,  9.86107292660788E-01)
-X( 4) = ( -3.81505893339174E-01, -4.03035145694045E-01)
-
-X( 5) = ( -1.40738815174224E-01,  5.53829941941276E-01)
-
-PATH NUMBER =      2214
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.66678224801614E-01, -4.03905150543325E-01)
-X( 2) = (  1.24868971065961E+00, -1.21419787257811E+00)
-X( 3) = ( -5.06844126279214E-01,  6.98257826141354E-01)
-X( 4) = ( -2.96365132017719E-01, -4.26052498802438E-01)
-
-X( 5) = ( -3.08033737621141E-01,  5.41748829106526E-01)
-
-PATH NUMBER =      2215
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.66734250233231E-01, -1.68043528979681E-01)
-X( 2) = (  1.53151893337244E+00, -7.63373702709637E-01)
-X( 3) = ( -3.17767605963070E-01,  5.45214951153464E-01)
-X( 4) = (  1.81765010853933E-02, -6.47184560268806E-01)
-
-X( 5) = ( -1.88507053551185E-01,  4.20313625677816E-01)
-
-PATH NUMBER =      2216
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.82519222980716E-01,  1.44120457287147E-01)
-X( 2) = (  1.51045520718031E+00, -3.59542895083741E-01)
-X( 3) = ( -6.61002309221863E-02,  3.14832548432983E-01)
-X( 4) = (  5.56287069290034E-02, -5.67334199844064E-01)
-
-X( 5) = ( -1.84081947255143E-01,  3.37097816001811E-01)
-
-PATH NUMBER =      2217
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.70560515387933E-01,  4.57677090178698E-01)
-X( 2) = (  1.23474201722781E+00, -6.37300511518066E-02)
-X( 3) = (  2.74775117200762E-01,  3.00118059475176E-01)
-X( 4) = (  3.29919387880207E-02, -4.82091461087940E-01)
-
-X( 5) = ( -1.42430055880688E-01,  2.94953767081412E-01)
-
-PATH NUMBER =      2218
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.16755148980021E-01,  6.25909736371209E-01)
-X( 2) = (  8.33388629304506E-01, -1.43492881831444E-02)
-X( 3) = (  5.45359074611541E-01,  5.07956557196729E-01)
-X( 4) = ( -3.91418079447346E-02, -4.31342368831940E-01)
-
-X( 5) = ( -9.77860939999291E-02,  2.83061095424213E-01)
-
-PATH NUMBER =      2219
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.44989577607455E-01,  5.70100471013605E-01)
-X( 2) = (  4.94192754165760E-01, -2.34506413976841E-01)
-X( 3) = (  6.19042400431932E-01,  8.41098098646121E-01)
-X( 4) = ( -1.27020351495710E-01, -4.38832987355980E-01)
-
-X( 5) = ( -5.67075047751271E-02,  2.90564299161219E-01)
-
-PATH NUMBER =      2220
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.60558233420257E-01,  3.16363069617606E-01)
-X( 2) = (  3.75867911531233E-01, -6.21187462600117E-01)
-X( 3) = (  4.61347847611625E-01,  1.14366205412336E+00)
-X( 4) = ( -1.89524344676182E-01, -5.01058373003711E-01)
-
-X( 5) = ( -2.05570382203881E-02,  3.15892763569907E-01)
-
-PATH NUMBER =      2221
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.62594146584873E-01, -1.65759177265007E-02)
-X( 2) = (  5.33779610303766E-01, -9.93460073920980E-01)
-X( 3) = (  1.46062449994976E-01,  1.27407538623685E+00)
-X( 4) = ( -1.97407474422501E-01, -5.88902576272431E-01)
-
-X( 5) = (  3.79701836820898E-03,  3.64476970864218E-01)
-
-PATH NUMBER =      2222
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.50144690704925E-01, -2.72930638635726E-01)
-X( 2) = (  8.94039211634647E-01, -1.17713375575318E+00)
-X( 3) = ( -1.79288250866299E-01,  1.17131624750794E+00)
-X( 4) = ( -1.46981136715136E-01, -6.61262318173132E-01)
-
-X( 5) = ( -1.06197999043784E-02,  4.38362906323674E-01)
-
-PATH NUMBER =      2223
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.22617327299339E-01, -3.32749870131278E-01)
-X( 2) = (  1.28807724422167E+00, -1.08626555106184E+00)
-X( 3) = ( -3.62469046168940E-01,  8.83466780988502E-01)
-X( 4) = ( -6.18403753936811E-02, -6.84279671281525E-01)
-
-X( 5) = ( -1.02057125519881E-01,  4.83855543243188E-01)
-
-PATH NUMBER =      2224
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.00616732485377E-01, -2.99491018249380E-01)
-X( 2) = (  1.47945822343673E+00, -6.40054040166987E-01)
-X( 3) = ( -3.26219899498478E-01,  7.79895754472381E-01)
-X( 4) = (  3.63818114625014E-01, -6.94248443086054E-01)
-
-X( 5) = ( -4.66212042670015E-02,  4.52564394333148E-01)
-
-PATH NUMBER =      2225
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.51682402621082E-02,  1.26729680174494E-02)
-X( 2) = (  1.45839449724460E+00, -2.36223232541090E-01)
-X( 3) = ( -7.45525244575944E-02,  5.49513351751900E-01)
-X( 4) = (  4.01270320468624E-01, -6.14398082661312E-01)
-
-X( 5) = ( -8.93280313828008E-02,  3.80514873859035E-01)
-
-PATH NUMBER =      2226
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.67904673306748E-02,  3.26229600909000E-01)
-X( 2) = (  1.18268130729210E+00,  5.95896113908438E-02)
-X( 3) = (  2.66322823665354E-01,  5.34798862794093E-01)
-X( 4) = (  3.78633552327641E-01, -5.29155343905188E-01)
-
-X( 5) = ( -7.24367686221244E-02,  3.22126397499888E-01)
-
-PATH NUMBER =      2227
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.84106131698629E-01,  4.94462247101510E-01)
-X( 2) = (  7.81327919368794E-01,  1.08970374359506E-01)
-X( 3) = (  5.36906781076133E-01,  7.42637360515646E-01)
-X( 4) = (  3.06499805594886E-01, -4.78406251649187E-01)
-
-X( 5) = ( -3.71988829970138E-02,  2.92731284875396E-01)
-
-PATH NUMBER =      2228
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.12340560326062E-01,  4.38652981743907E-01)
-X( 2) = (  4.42132044230048E-01, -1.11186751434191E-01)
-X( 3) = (  6.10590106896525E-01,  1.07577890196504E+00)
-X( 4) = (  2.18621262043911E-01, -4.85896870173228E-01)
-
-X( 5) = (  1.29789754531660E-03,  2.84006429051247E-01)
-
-PATH NUMBER =      2229
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.27909216138864E-01,  1.84915580347908E-01)
-X( 2) = (  3.23807201595521E-01, -4.97867800057467E-01)
-X( 3) = (  4.52895554076217E-01,  1.37834285744228E+00)
-X( 4) = (  1.56117268863438E-01, -5.48122255820959E-01)
-
-X( 5) = (  3.98742020688531E-02,  2.92362280563181E-01)
-
-PATH NUMBER =      2230
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.29945129303481E-01, -1.48023406996198E-01)
-X( 2) = (  4.81718900368053E-01, -8.70140411378329E-01)
-X( 3) = (  1.37610156459569E-01,  1.50875618955576E+00)
-X( 4) = (  1.48234139117119E-01, -6.35966459089678E-01)
-
-X( 5) = (  7.53873882789162E-02,  3.21412408288808E-01)
-
-PATH NUMBER =      2231
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.17495673423533E-01, -4.04378127905424E-01)
-X( 2) = (  8.41978501698935E-01, -1.05381409321053E+00)
-X( 3) = ( -1.87740544401706E-01,  1.40599705082685E+00)
-X( 4) = (  1.98660476824485E-01, -7.08326200990380E-01)
-
-X( 5) = (  9.28426245068288E-02,  3.79619629301005E-01)
-
-PATH NUMBER =      2232
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.89968310017948E-01, -4.64197359400975E-01)
-X( 2) = (  1.23601653428596E+00, -9.62945888519188E-01)
-X( 3) = ( -3.70921339704347E-01,  1.11814758430742E+00)
-X( 4) = (  2.83801238145939E-01, -7.31343554098772E-01)
-
-X( 5) = (  5.08620569267086E-02,  4.52075142235265E-01)
-
-PATH NUMBER =      2233
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.20926649732398E-01, -5.72035536095415E-01)
-X( 2) = (  1.36030905477251E+00, -5.79049677247043E-01)
-X( 3) = ( -4.83544644597571E-01,  9.54238650203541E-01)
-X( 4) = (  6.58847032726384E-01, -5.08127322414478E-01)
-
-X( 5) = (  1.07780342160345E-01,  4.98127407443259E-01)
-
-PATH NUMBER =      2234
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.05141676984913E-01, -2.59871549828586E-01)
-X( 2) = (  1.33924532858038E+00, -1.75218869621146E-01)
-X( 3) = ( -2.31877269556687E-01,  7.23856247483060E-01)
-X( 4) = (  6.96299238569994E-01, -4.28276961989736E-01)
-
-X( 5) = (  1.12254137377253E-02,  4.49752329304859E-01)
-
-PATH NUMBER =      2235
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.17100384577696E-01,  5.36850830629651E-02)
-X( 2) = (  1.06353213862788E+00,  1.20593974310788E-01)
-X( 3) = (  1.08998078566261E-01,  7.09141758525253E-01)
-X( 4) = (  6.73662470429011E-01, -3.43034223233612E-01)
-
-X( 5) = ( -3.36757794718148E-03,  3.72234508440074E-01)
-
-PATH NUMBER =      2236
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.04416048945650E-01,  2.21917729255476E-01)
-X( 2) = (  6.62178750704572E-01,  1.69974737279450E-01)
-X( 3) = (  3.79582035977041E-01,  9.16980256246806E-01)
-X( 4) = (  6.01528723696256E-01, -2.92285130977611E-01)
-
-X( 5) = (  2.21554654615456E-02,  3.21772153825266E-01)
-
-PATH NUMBER =      2237
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.32650477573083E-01,  1.66108463897872E-01)
-X( 2) = (  3.22982875565826E-01, -5.01823885142459E-02)
-X( 3) = (  4.53265361797432E-01,  1.25012179769620E+00)
-X( 4) = (  5.13650180145281E-01, -2.99775749501652E-01)
-
-X( 5) = (  5.96173291629721E-02,  2.95446293144010E-01)
-
-PATH NUMBER =      2238
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.04821913338589E+00, -8.76289374981276E-02)
-X( 2) = (  2.04658032931299E-01, -4.36863437137522E-01)
-X( 3) = (  2.95570808977124E-01,  1.55268575317344E+00)
-X( 4) = (  4.51146186964809E-01, -3.62001135149383E-01)
-
-X( 5) = (  1.02159070758037E-01,  2.87386901796892E-01)
-
-PATH NUMBER =      2239
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.05025504655050E+00, -4.20567924842234E-01)
-X( 2) = (  3.62569731703832E-01, -8.09136048458385E-01)
-X( 3) = ( -1.97145886395247E-02,  1.68309908528692E+00)
-X( 4) = (  4.43263057218489E-01, -4.49845338418102E-01)
-
-X( 5) = (  1.48678102492419E-01,  2.99208126419830E-01)
-
-PATH NUMBER =      2240
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.37805590670554E-01, -6.76922645751460E-01)
-X( 2) = (  7.22829333034712E-01, -9.92809730290586E-01)
-X( 3) = ( -3.45065289500800E-01,  1.58033994655801E+00)
-X( 4) = (  4.93689394925854E-01, -5.22205080318803E-01)
-
-X( 5) = (  1.92836983850204E-01,  3.42524331825533E-01)
-
-PATH NUMBER =      2241
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.10278227264969E-01, -7.36741877247011E-01)
-X( 2) = (  1.11686736562174E+00, -9.01941525599244E-01)
-X( 3) = ( -5.28246084803441E-01,  1.29249048003858E+00)
-X( 4) = (  5.78830156247309E-01, -5.45222433427196E-01)
-
-X( 5) = (  1.98876233597157E-01,  4.30033938716425E-01)
-
-PATH NUMBER =      2242
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.37901154132159E-01, -8.58150473622709E-01)
-X( 2) = (  1.22982264759328E+00, -6.08905233348020E-01)
-X( 3) = ( -7.16127844558703E-01,  9.86666659828877E-01)
-X( 4) = (  7.65215945728679E-01, -1.75909339122154E-01)
-
-X( 5) = (  3.28858248080137E-01,  5.83713422793503E-01)
-
-PATH NUMBER =      2243
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.21161813846743E-02, -5.45986487355880E-01)
-X( 2) = (  1.20875892140114E+00, -2.05074425722123E-01)
-X( 3) = ( -4.64460469517819E-01,  7.56284257108397E-01)
-X( 4) = (  8.02668151572290E-01, -9.60589786974131E-02)
-
-X( 5) = (  1.37471681393167E-01,  5.91189483136990E-01)
-
-PATH NUMBER =      2244
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.34074888977458E-01, -2.32429854464329E-01)
-X( 2) = (  9.33045731448643E-01,  9.07384182098118E-02)
-X( 3) = ( -1.23585121394871E-01,  7.41569768150590E-01)
-X( 4) = (  7.80031383431307E-01, -1.08162399412894E-02)
-
-X( 5) = (  6.71907975821509E-02,  4.73813238959906E-01)
-
-PATH NUMBER =      2245
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.21390553345412E-01, -6.41972082718187E-02)
-X( 2) = (  5.31692343525338E-01,  1.40119181178474E-01)
-X( 3) = (  1.46998836015909E-01,  9.49408265872143E-01)
-X( 4) = (  7.07897636698552E-01,  3.99328523147110E-02)
-
-X( 5) = (  8.27726107229620E-02,  3.86168617930699E-01)
-
-PATH NUMBER =      2246
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.49624981972845E-01, -1.20006473629422E-01)
-X( 2) = (  1.92496468386591E-01, -8.00379446152226E-02)
-X( 3) = (  2.20682161836300E-01,  1.28254980732153E+00)
-X( 4) = (  6.20019093147577E-01,  3.24422337906710E-02)
-
-X( 5) = (  1.23417923217555E-01,  3.33893878507515E-01)
-
-PATH NUMBER =      2247
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.65193637785647E-01, -3.73743875025423E-01)
-X( 2) = (  7.41716257520643E-02, -4.66718993238499E-01)
-X( 3) = (  6.29876090159915E-02,  1.58511376279878E+00)
-X( 4) = (  5.57515099967105E-01, -2.97831518570596E-02)
-
-X( 5) = (  1.74471474387364E-01,  3.04609421399515E-01)
-
-PATH NUMBER =      2248
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.67229550950264E-01, -7.06682862369528E-01)
-X( 2) = (  2.32083324524597E-01, -8.38991604559362E-01)
-X( 3) = ( -2.52297788600656E-01,  1.71552709491226E+00)
-X( 4) = (  5.49631970220786E-01, -1.17627355125779E-01)
-
-X( 5) = (  2.36426362479047E-01,  2.95683407044576E-01)
-
-PATH NUMBER =      2249
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.54780095070316E-01, -9.63037583278755E-01)
-X( 2) = (  5.92342925855478E-01, -1.02266528639156E+00)
-X( 3) = ( -5.77648489461932E-01,  1.61276795618335E+00)
-X( 4) = (  6.00058307928151E-01, -1.89987097026480E-01)
-
-X( 5) = (  3.12520942125566E-01,  3.19261555223000E-01)
-
-PATH NUMBER =      2250
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.27252731664730E-01, -1.02285681477431E+00)
-X( 2) = (  9.86380958442504E-01, -9.31797081700221E-01)
-X( 3) = ( -7.60829284764573E-01,  1.32491848966392E+00)
-X( 4) = (  6.85199069249605E-01, -2.13004450134873E-01)
-
-X( 5) = (  3.84000878875565E-01,  4.14220053887704E-01)
-
-PATH NUMBER =      2251
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09611202198385E-01, -1.02395947174891E+00)
-X( 2) = (  1.14905504201307E+00, -7.15650961962724E-01)
-X( 3) = ( -9.15141235245720E-01,  8.62006357247513E-01)
-X( 4) = (  6.33153657079340E-01,  1.46957020216824E-01)
-
-X( 5) = (  8.00028966622356E-01,  8.60948189643720E-01)
-
-PATH NUMBER =      2252
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.25396174945870E-01, -7.11795485482080E-01)
-X( 2) = (  1.12799131582094E+00, -3.11820154336827E-01)
-X( 3) = ( -6.63473860204836E-01,  6.31623954527032E-01)
-X( 4) = (  6.70605862922950E-01,  2.26807380641566E-01)
-
-X( 5) = (  2.41772422646126E-01,  1.02075904001142E+00)
-
-PATH NUMBER =      2253
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13437467353087E-01, -3.98238852590529E-01)
-X( 2) = (  8.52278125868439E-01, -1.60073104048928E-02)
-X( 3) = ( -3.22598512081888E-01,  6.16909465569225E-01)
-X( 4) = (  6.47969094781968E-01,  3.12050119397689E-01)
-
-X( 5) = (  7.15214994645144E-02,  7.11292170570397E-01)
-
-PATH NUMBER =      2254
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.73878197014867E-01, -2.30006206398019E-01)
-X( 2) = (  4.50924737945134E-01,  3.33734525637690E-02)
-X( 3) = ( -5.20145546711083E-02,  8.24747963290779E-01)
-X( 4) = (  5.75835348049212E-01,  3.62799211653690E-01)
-
-X( 5) = (  1.11686014329880E-01,  5.32538154491897E-01)
-
-PATH NUMBER =      2255
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.02112625642300E-01, -2.85815471755622E-01)
-X( 2) = (  1.11728862806387E-01, -1.86783673229927E-01)
-X( 3) = (  2.16687711492829E-02,  1.15788950474017E+00)
-X( 4) = (  4.87956804498237E-01,  3.55308593129649E-01)
-
-X( 5) = (  1.82078774732508E-01,  4.34457656045886E-01)
-
-PATH NUMBER =      2256
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.17681281455103E-01, -5.39552873151622E-01)
-X( 2) = ( -6.59597982813923E-03, -5.73464721853203E-01)
-X( 3) = ( -1.36025781671025E-01,  1.46045346021741E+00)
-X( 4) = (  4.25452811317765E-01,  2.93083207481919E-01)
-
-X( 5) = (  2.62179056993264E-01,  3.72751418767837E-01)
-
-PATH NUMBER =      2257
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.19717194619719E-01, -8.72491860495728E-01)
-X( 2) = (  1.51315718944394E-01, -9.45737333174066E-01)
-X( 3) = ( -4.51311179287674E-01,  1.59086679233090E+00)
-X( 4) = (  4.17569681571446E-01,  2.05239004213200E-01)
-
-X( 5) = (  3.59722269863166E-01,  3.33219988083453E-01)
-
-PATH NUMBER =      2258
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.07267738739771E-01, -1.12884658140495E+00)
-X( 2) = (  5.11575320275274E-01, -1.12941101500627E+00)
-X( 3) = ( -7.76661880148948E-01,  1.48810765360198E+00)
-X( 4) = (  4.67996019278810E-01,  1.32879262312498E-01)
-
-X( 5) = (  4.96334862901493E-01,  3.24168575571002E-01)
-
-PATH NUMBER =      2259
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.79740375334185E-01, -1.18866581290050E+00)
-X( 2) = (  9.05613352862300E-01, -1.03854281031493E+00)
-X( 3) = ( -9.59842675451590E-01,  1.20025818708255E+00)
-X( 4) = (  5.53136780600265E-01,  1.09861909204105E-01)
-
-X( 5) = (  7.05373991504031E-01,  4.17265704455098E-01)
-
-PATH NUMBER =      2260
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.05796636938743E-01, -9.91878657489015E-01)
-X( 2) = (  1.15579829831483E+00, -8.49339350325710E-01)
-X( 3) = ( -9.87464239368700E-01,  6.38587683482207E-01)
-X( 4) = (  3.24453579346241E-01,  3.09398997807861E-01)
-
-X( 5) = (  6.28852759846211E-01,  4.83875177471865E+00)
-
-PATH NUMBER =      2261
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.21581609686228E-01, -6.79714671222186E-01)
-X( 2) = (  1.13473457212269E+00, -4.45508542699812E-01)
-X( 3) = ( -7.35796864327816E-01,  4.08205280761726E-01)
-X( 4) = (  3.61905785189851E-01,  3.89249358232603E-01)
-
-X( 5) = ( -9.03731016194594E-01,  1.37717456751978E+00)
-
-PATH NUMBER =      2262
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.09622902093445E-01, -3.66158038330636E-01)
-X( 2) = (  8.59021382170192E-01, -1.49695698767878E-01)
-X( 3) = ( -3.94921516204868E-01,  3.93490791803919E-01)
-X( 4) = (  3.39269017048869E-01,  4.74492096988726E-01)
-
-X( 5) = ( -3.70341026518563E-01,  8.71734168887321E-01)
-
-PATH NUMBER =      2263
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22307237725491E-01, -1.97925392138125E-01)
-X( 2) = (  4.57667994246888E-01, -1.00314935799216E-01)
-X( 3) = ( -1.24337558794089E-01,  6.01329289525473E-01)
-X( 4) = (  2.67135270316113E-01,  5.25241189244727E-01)
-
-X( 5) = ( -9.08944414015631E-02,  7.13788407039240E-01)
-
-PATH NUMBER =      2264
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.05927190901942E-01, -2.53734657495729E-01)
-X( 2) = (  1.18472119108141E-01, -3.20472061592913E-01)
-X( 3) = ( -5.06542329736971E-02,  9.34470830974864E-01)
-X( 4) = (  1.79256726765138E-01,  5.17750570720687E-01)
-
-X( 5) = (  1.09889265980017E-01,  6.31156198732557E-01)
-
-PATH NUMBER =      2265
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.21495846714745E-01, -5.07472058891728E-01)
-X( 2) = (  1.47276473614285E-04, -7.07153110216189E-01)
-X( 3) = ( -2.08348785794005E-01,  1.23703478645211E+00)
-X( 4) = (  1.16752733584666E-01,  4.55525185072956E-01)
-
-X( 5) = (  2.96477650238769E-01,  5.74364475661264E-01)
-
-PATH NUMBER =      2266
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.23531759879361E-01, -8.40411046235835E-01)
-X( 2) = (  1.58058975246147E-01, -1.07942572153705E+00)
-X( 3) = ( -5.23634183410654E-01,  1.36744811856559E+00)
-X( 4) = (  1.08869603838347E-01,  3.67680981804236E-01)
-
-X( 5) = (  5.17543193750096E-01,  5.29881920087271E-01)
-
-PATH NUMBER =      2267
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.11082303999413E-01, -1.09676576714506E+00)
-X( 2) = (  5.18318576577028E-01, -1.26309940336925E+00)
-X( 3) = ( -8.48984884271929E-01,  1.26468897983668E+00)
-X( 4) = (  1.59295941545712E-01,  2.95321239903535E-01)
-
-X( 5) = (  8.67204138442161E-01,  5.06835442268283E-01)
-
-PATH NUMBER =      2268
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.16445059406173E-01, -1.15658499864061E+00)
-X( 2) = (  9.12356609164054E-01, -1.17223119867791E+00)
-X( 3) = ( -1.03216567957457E+00,  9.76839513317246E-01)
-X( 4) = (  2.44436702867167E-01,  2.72303886795142E-01)
-
-X( 5) = (  1.72779098724503E+00,  6.98804971203314E-01)
-
-PATH NUMBER =      2269
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.47896497802811E-01, -7.85142677091983E-01)
-X( 2) = (  1.44925395558797E+00, -7.27718707864426E-01)
-X( 3) = ( -1.42111528193835E+00,  5.03840010190346E-01)
-X( 4) = (  2.45756343245345E-01,  2.34185263844955E-01)
-
-X( 5) = (  4.32389314543291E-01,  1.48581421179159E+00)
-
-PATH NUMBER =      2270
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.63681470550296E-01, -4.72978690825154E-01)
-X( 2) = (  1.42819022939584E+00, -3.23887900238529E-01)
-X( 3) = ( -1.16944790689746E+00,  2.73457607469867E-01)
-X( 4) = (  2.83208549088956E-01,  3.14035624269696E-01)
-
-X( 5) = ( -2.01642695302599E-01,  1.04229450642693E+00)
-
-PATH NUMBER =      2271
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.51722762957513E-01, -1.59422057933604E-01)
-X( 2) = (  1.15247703944334E+00, -2.80750563065943E-02)
-X( 3) = ( -8.28572558774515E-01,  2.58743118512060E-01)
-X( 4) = (  2.60571780947973E-01,  3.99278363025820E-01)
-
-X( 5) = ( -1.29581363771176E-01,  6.95807190172163E-01)
-
-PATH NUMBER =      2272
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.64407098589559E-01,  8.81058825890695E-03)
-X( 2) = (  7.51123651520034E-01,  2.13057066620682E-02)
-X( 3) = ( -5.57988601363736E-01,  4.66581616233613E-01)
-X( 4) = (  1.88438034215218E-01,  4.50027455281820E-01)
-
-X( 5) = ( -6.63407152238202E-03,  5.56753490817899E-01)
-
-PATH NUMBER =      2273
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.38273300378742E-02, -4.69986770986967E-02)
-X( 2) = (  4.11927776381287E-01, -1.98851419131628E-01)
-X( 3) = ( -4.84305275543345E-01,  7.99723157683004E-01)
-X( 4) = (  1.00559490664243E-01,  4.42536836757780E-01)
-
-X( 5) = (  1.05470104386009E-01,  4.88740608273055E-01)
-
-PATH NUMBER =      2274
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.79395985850677E-01, -3.00736078494696E-01)
-X( 2) = (  2.93602933746760E-01, -5.85532467754904E-01)
-X( 3) = ( -6.41999828363653E-01,  1.10228711316024E+00)
-X( 4) = (  3.80554974837712E-02,  3.80311451110050E-01)
-
-X( 5) = (  2.18269429330844E-01,  4.52822928647020E-01)
-
-PATH NUMBER =      2275
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.81431899015293E-01, -6.33675065838803E-01)
-X( 2) = (  4.51514632519292E-01, -9.57805079075767E-01)
-X( 3) = ( -9.57285225980301E-01,  1.23270044527373E+00)
-X( 4) = (  3.01723677374519E-02,  2.92467247841330E-01)
-
-X( 5) = (  3.52052237034268E-01,  4.43661637691390E-01)
-
-PATH NUMBER =      2276
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.89824431353453E-02, -8.90029786748028E-01)
-X( 2) = (  8.11774233850173E-01, -1.14147876090797E+00)
-X( 3) = ( -1.28263592684158E+00,  1.12994130654482E+00)
-X( 4) = (  8.05987054448163E-02,  2.20107505940629E-01)
-
-X( 5) = (  5.41143114101460E-01,  4.90917398872060E-01)
-
-PATH NUMBER =      2277
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.58544920270241E-01, -9.49849018243580E-01)
-X( 2) = (  1.20581226643720E+00, -1.05061055621663E+00)
-X( 3) = ( -1.46581672214422E+00,  8.42091840025385E-01)
-X( 4) = (  1.65739466766271E-01,  1.97090152832236E-01)
-
-X( 5) = (  8.07400879084940E-01,  7.66340756726616E-01)
-
-PATH NUMBER =      2278
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.67735124190874E-01, -4.87886189696085E-01)
-X( 2) = (  1.58208227110389E+00, -7.44292641792371E-01)
-X( 3) = ( -1.21364959771592E+00,  3.93819509452795E-01)
-X( 4) = (  3.21770183550648E-02, -4.16172126767774E-02)
-
-X( 5) = ( -2.53039421286024E-01,  8.39548017539525E-01)
-
-PATH NUMBER =      2279
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.83520096938359E-01, -1.75722203429256E-01)
-X( 2) = (  1.56101854491175E+00, -3.40461834166474E-01)
-X( 3) = ( -9.61982222675037E-01,  1.63437106732315E-01)
-X( 4) = (  6.96292241986752E-02,  3.82331477479643E-02)
-
-X( 5) = ( -2.84110007437337E-01,  5.76089946355520E-01)
-
-PATH NUMBER =      2280
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71561389345576E-01,  1.37834429462295E-01)
-X( 2) = (  1.28530535495925E+00, -4.46489902345395E-02)
-X( 3) = ( -6.21106874552090E-01,  1.48722617774508E-01)
-X( 4) = (  4.69924560576930E-02,  1.23475886504088E-01)
-
-X( 5) = ( -1.89640198809522E-01,  4.59185371580693E-01)
-
-PATH NUMBER =      2281
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.84245724977622E-01,  3.06067075654805E-01)
-X( 2) = (  8.83951967035949E-01,  4.73177273412249E-03)
-X( 3) = ( -3.50522917141311E-01,  3.56561115496061E-01)
-X( 4) = ( -2.51412906750622E-02,  1.74224978760089E-01)
-
-X( 5) = ( -9.79343122605624E-02,  4.18111616234952E-01)
-
-PATH NUMBER =      2282
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.39887036498115E-02,  2.50257810297202E-01)
-X( 2) = (  5.44756091897203E-01, -2.15425353059574E-01)
-X( 3) = ( -2.76839591320920E-01,  6.89702656945452E-01)
-X( 4) = ( -1.13019834226037E-01,  1.66734360236049E-01)
-
-X( 5) = ( -1.48892014431798E-02,  4.11582543400384E-01)
-
-PATH NUMBER =      2283
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.59557359462614E-01, -3.47959109879776E-03)
-X( 2) = (  4.26431249262676E-01, -6.02106401682849E-01)
-X( 3) = ( -4.34534144141227E-01,  9.92266612422692E-01)
-X( 4) = ( -1.75523827406510E-01,  1.04508974588318E-01)
-
-X( 5) = (  6.74673935607668E-02,  4.31248546535941E-01)
-
-PATH NUMBER =      2284
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.61593272627231E-01, -3.36418578442904E-01)
-X( 2) = (  5.84342948035208E-01, -9.74379013003712E-01)
-X( 3) = ( -7.49819541757875E-01,  1.12267994453618E+00)
-X( 4) = ( -1.83406957152829E-01,  1.66647713195988E-02)
-
-X( 5) = (  1.55311952439299E-01,  4.89991969776130E-01)
-
-PATH NUMBER =      2285
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.91438167472825E-02, -5.92773299352130E-01)
-X( 2) = (  9.44602549366089E-01, -1.15805269483591E+00)
-X( 3) = ( -1.07517024261915E+00,  1.01992080580727E+00)
-X( 4) = ( -1.32980619445464E-01, -5.56949705811029E-02)
-
-X( 5) = (  2.30245070733075E-01,  6.35460049767948E-01)
-
-PATH NUMBER =      2286
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.78383546658303E-01, -6.52592530847681E-01)
-X( 2) = (  1.33864058195312E+00, -1.06718449014457E+00)
-X( 3) = ( -1.25835103792179E+00,  7.32071339287833E-01)
-X( 4) = ( -4.78398581240096E-02, -7.87123236894957E-02)
-
-X( 5) = (  1.17463523713940E-01,  9.02248835221332E-01)
-
-PATH NUMBER =      2287
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.91859606697537E-01, -2.47422486109944E-01)
-X( 2) = (  1.69448818346636E+00, -6.71608616349330E-01)
-X( 3) = ( -9.84001848493849E-01,  4.42895287486940E-01)
-X( 4) = (  4.58481779867936E-02, -3.90180310939390E-01)
-
-X( 5) = ( -1.24540960624946E-01,  5.32452622116439E-01)
-
-PATH NUMBER =      2288
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07644579445022E-01,  6.47415001568856E-02)
-X( 2) = (  1.67342445727422E+00, -2.67777808723433E-01)
-X( 3) = ( -7.32334473452965E-01,  2.12512884766460E-01)
-X( 4) = (  8.33003838304042E-02, -3.10329950514648E-01)
-
-X( 5) = ( -1.56783466929746E-01,  4.21264240611821E-01)
-
-PATH NUMBER =      2289
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.95685871852239E-01,  3.78298133048436E-01)
-X( 2) = (  1.39771126732172E+00,  2.80350352085010E-02)
-X( 3) = ( -3.91459125330017E-01,  1.97798395808653E-01)
-X( 4) = (  6.06636156894216E-02, -2.25087211758525E-01)
-
-X( 5) = ( -1.18348539096352E-01,  3.52550802986318E-01)
-
-PATH NUMBER =      2290
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08370207484285E-01,  5.46530779240947E-01)
-X( 2) = (  9.96357879398418E-01,  7.74157981771635E-02)
-X( 3) = ( -1.20875167919238E-01,  4.05636893530206E-01)
-X( 4) = ( -1.14701310433334E-02, -1.74338119502524E-01)
-
-X( 5) = ( -6.78083194533923E-02,  3.24100213584882E-01)
-
-PATH NUMBER =      2291
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.19864221143148E-01,  4.90721513883343E-01)
-X( 2) = (  6.57162004259671E-01, -1.42741327616533E-01)
-X( 3) = ( -4.71918420988472E-02,  7.38778434979597E-01)
-X( 4) = ( -9.93486745943085E-02, -1.81828738026564E-01)
-
-X( 5) = ( -1.79937885652756E-02,  3.19992035988687E-01)
-
-PATH NUMBER =      2292
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.35432876955951E-01,  2.36984112487343E-01)
-X( 2) = (  5.38837161625144E-01, -5.29422376239808E-01)
-X( 3) = ( -2.04886394919155E-01,  1.04134239045684E+00)
-X( 4) = ( -1.61852667774781E-01, -2.44054123674295E-01)
-
-X( 5) = (  3.03542645022050E-02,  3.35987478143136E-01)
-
-PATH NUMBER =      2293
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.37468790120567E-01, -9.59548748567629E-02)
-X( 2) = (  6.96748860397677E-01, -9.01694987560672E-01)
-X( 3) = ( -5.20171792535803E-01,  1.17175572257032E+00)
-X( 4) = ( -1.69735797521100E-01, -3.31898326943014E-01)
-
-X( 5) = (  7.44828860216256E-02,  3.78536806847243E-01)
-
-PATH NUMBER =      2294
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.25019334240619E-01, -3.52309595765989E-01)
-X( 2) = (  1.05700846172856E+00, -1.08536866939287E+00)
-X( 3) = ( -8.45522493397078E-01,  1.06899658384141E+00)
-X( 4) = ( -1.19309459813735E-01, -4.04258068843715E-01)
-
-X( 5) = (  9.25994113992573E-02,  4.62266100482088E-01)
-
-PATH NUMBER =      2295
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02508029164967E-01, -4.12128827261540E-01)
-X( 2) = (  1.45104649431558E+00, -9.94500464701532E-01)
-X( 3) = ( -1.02870328869972E+00,  7.81147117321978E-01)
-X( 4) = ( -3.41686984922808E-02, -4.27275421952108E-01)
-
-X( 5) = (  1.72093724737977E-02,  5.61704625600812E-01)
-
-PATH NUMBER =      2296
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02564054596584E-01, -1.76267205697896E-01)
-X( 2) = (  1.73387571702842E+00, -5.43676294833065E-01)
-X( 3) = ( -8.39626768383575E-01,  6.28104242334088E-01)
-X( 4) = (  2.80372934610831E-01, -6.48407483418476E-01)
-
-X( 5) = ( -7.28271415667011E-03,  4.22801100497036E-01)
-
-PATH NUMBER =      2297
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.18349027344069E-01,  1.35896780568933E-01)
-X( 2) = (  1.71281199083628E+00, -1.39845487207168E-01)
-X( 3) = ( -5.87959393342692E-01,  3.97721839613608E-01)
-X( 4) = (  3.17825140454441E-01, -5.68557122993735E-01)
-
-X( 5) = ( -5.49537451095604E-02,  3.66459228766338E-01)
-
-PATH NUMBER =      2298
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06390319751285E-01,  4.49453413460484E-01)
-X( 2) = (  1.43709880088378E+00,  1.55967356724767E-01)
-X( 3) = ( -2.47084045219744E-01,  3.83007350655801E-01)
-X( 4) = (  2.95188372313459E-01, -4.83314384237611E-01)
-
-X( 5) = ( -4.77772711295176E-02,  3.11863604556573E-01)
-
-PATH NUMBER =      2299
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.80925344616669E-01,  6.17686059652994E-01)
-X( 2) = (  1.03574541296048E+00,  2.05348119693429E-01)
-X( 3) = (  2.34999121910355E-02,  5.90845848377354E-01)
-X( 4) = (  2.23054625580704E-01, -4.32565291981611E-01)
-
-X( 5) = ( -1.92775103289191E-02,  2.81175000842641E-01)
-
-PATH NUMBER =      2300
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.09159773244102E-01,  5.61876794295391E-01)
-X( 2) = (  6.96549537821731E-01, -1.48090061002672E-02)
-X( 3) = (  9.71832380114264E-02,  9.23987389826745E-01)
-X( 4) = (  1.35176082029729E-01, -4.40055910505651E-01)
-
-X( 5) = (  1.46177096765752E-02,  2.69548943393699E-01)
-
-PATH NUMBER =      2301
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.24728429056904E-01,  3.08139392899391E-01)
-X( 2) = (  5.78224695187204E-01, -4.01490054723543E-01)
-X( 3) = ( -6.05113148088814E-02,  1.22655134530399E+00)
-X( 4) = (  7.26720888492573E-02, -5.02281296153381E-01)
-
-X( 5) = (  4.97431206534847E-02,  2.73767071906532E-01)
-
-PATH NUMBER =      2302
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.26764342221521E-01, -2.47995944447160E-02)
-X( 2) = (  7.36136393959736E-01, -7.73762666044406E-01)
-X( 3) = ( -3.75796712425530E-01,  1.35696467741747E+00)
-X( 4) = (  6.47889591029380E-02, -5.90125499422100E-01)
-
-X( 5) = (  8.30812068514137E-02,  2.96507949402191E-01)
-
-PATH NUMBER =      2303
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.14314886341572E-01, -2.81154315353941E-01)
-X( 2) = (  1.09639599529062E+00, -9.57436347876607E-01)
-X( 3) = ( -7.01147413286804E-01,  1.25420553868856E+00)
-X( 4) = (  1.15215296810302E-01, -6.62485241322801E-01)
-
-X( 5) = (  1.02606518158424E-01,  3.44907880070101E-01)
-
-PATH NUMBER =      2304
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.86787522935987E-01, -3.40973546849493E-01)
-X( 2) = (  1.49043402787764E+00, -8.66568143185266E-01)
-X( 3) = ( -8.84328208589445E-01,  9.66356072169126E-01)
-X( 4) = (  2.00356058131757E-01, -6.85502594431194E-01)
-
-X( 5) = (  7.46193722222147E-02,  4.09704139810345E-01)
-
-PATH NUMBER =      2305
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.64786928122024E-01, -3.07714694967594E-01)
-X( 2) = (  1.68181500709270E+00, -4.20356632290414E-01)
-X( 3) = ( -8.48079061918983E-01,  8.62785045653005E-01)
-X( 4) = (  6.26014548150452E-01, -6.95471366235724E-01)
-
-X( 5) = (  8.90013537950245E-02,  3.67530176904793E-01)
-
-PATH NUMBER =      2306
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.90019553745392E-02,  4.44929129923492E-03)
-X( 2) = (  1.66075128090057E+00, -1.65258246645175E-02)
-X( 3) = ( -5.96411686878099E-01,  6.32402642932525E-01)
-X( 4) = (  6.63466753994062E-01, -6.15621005810983E-01)
-
-X( 5) = (  3.15549300849163E-02,  3.45003912527151E-01)
-
-PATH NUMBER =      2307
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.60960662967323E-01,  3.18005924190786E-01)
-X( 2) = (  1.38503809094807E+00,  2.79287019267417E-01)
-X( 3) = ( -2.55536338755152E-01,  6.17688153974718E-01)
-X( 4) = (  6.40829985853080E-01, -5.30378267054859E-01)
-
-X( 5) = (  1.63809762098141E-02,  2.98622004110082E-01)
-
-PATH NUMBER =      2308
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.48276327335277E-01,  4.86238570383296E-01)
-X( 2) = (  9.83684703024766E-01,  3.28667782236080E-01)
-X( 3) = (  1.50476186556275E-02,  8.25526651696271E-01)
-X( 4) = (  5.68696239120325E-01, -4.79629174798858E-01)
-
-X( 5) = (  2.95950830092821E-02,  2.63662636986866E-01)
-
-PATH NUMBER =      2309
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.76510755962710E-01,  4.30429305025692E-01)
-X( 2) = (  6.44488827886019E-01,  1.08510656442384E-01)
-X( 3) = (  8.87309444760185E-02,  1.15866819314566E+00)
-X( 4) = (  4.80817695569350E-01, -4.87119793322898E-01)
-
-X( 5) = (  5.40070829133839E-02,  2.44155747008734E-01)
-
-PATH NUMBER =      2310
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.92079411775513E-01,  1.76691903629693E-01)
-X( 2) = (  5.26163985251493E-01, -2.78170392180892E-01)
-X( 3) = ( -6.89636083442890E-02,  1.46123214862290E+00)
-X( 4) = (  4.18313702388878E-01, -5.49345178970629E-01)
-
-X( 5) = (  8.31345297048423E-02,  2.38251622552369E-01)
-
-PATH NUMBER =      2311
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.94115324940129E-01, -1.56247083714414E-01)
-X( 2) = (  6.84075684024025E-01, -6.50443003501755E-01)
-X( 3) = ( -3.84249005960937E-01,  1.59164548073639E+00)
-X( 4) = (  4.10430572642559E-01, -6.37189382239348E-01)
-
-X( 5) = (  1.14220655293018E-01,  2.47296642933339E-01)
-
-PATH NUMBER =      2312
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.81665869060181E-01, -4.12601804623639E-01)
-X( 2) = (  1.04433528535491E+00, -8.34116685333957E-01)
-X( 3) = ( -7.09599706822212E-01,  1.48888634200748E+00)
-X( 4) = (  4.60856910349923E-01, -7.09549124140050E-01)
-
-X( 5) = (  1.40612609174215E-01,  2.77191781468761E-01)
-
-PATH NUMBER =      2313
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.54138505654595E-01, -4.72421036119191E-01)
-X( 2) = (  1.43837331794193E+00, -7.43248480642615E-01)
-X( 3) = ( -8.92780502124853E-01,  1.20103687548804E+00)
-X( 4) = (  5.45997671671378E-01, -7.32566477248442E-01)
-
-X( 5) = (  1.40346899058618E-01,  3.29640519534871E-01)
-
-PATH NUMBER =      2314
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.85096845369046E-01, -5.80259212813629E-01)
-X( 2) = (  1.56266583842848E+00, -3.59352269370470E-01)
-X( 3) = ( -1.00540380701808E+00,  1.03712794138416E+00)
-X( 4) = (  9.21043466251822E-01, -5.09350245564148E-01)
-
-X( 5) = (  1.83225660619379E-01,  3.33990781223789E-01)
-
-PATH NUMBER =      2315
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.69311872621561E-01, -2.68095226546800E-01)
-X( 2) = (  1.54160211223635E+00,  4.44785382554275E-02)
-X( 3) = ( -7.53736431977193E-01,  8.06745538663685E-01)
-X( 4) = (  9.58495672095432E-01, -4.29499885139406E-01)
-
-X( 5) = (  1.18738607486586E-01,  3.42610838998058E-01)
-
-PATH NUMBER =      2316
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.81270580214344E-01,  4.54614063447506E-02)
-X( 2) = (  1.26588892228385E+00,  3.40291382187362E-01)
-X( 3) = ( -4.12861083854245E-01,  7.92031049705878E-01)
-X( 4) = (  9.35858903954450E-01, -3.44257146383283E-01)
-
-X( 5) = (  8.14958765121075E-02,  3.03879237883768E-01)
-
-PATH NUMBER =      2317
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.68586244582298E-01,  2.13694052537261E-01)
-X( 2) = (  8.64535534360544E-01,  3.89672145156024E-01)
-X( 3) = ( -1.42277126443466E-01,  9.99869547427431E-01)
-X( 4) = (  8.63725157221695E-01, -2.93508054127282E-01)
-
-X( 5) = (  8.02675144762925E-02,  2.63131783320663E-01)
-
-PATH NUMBER =      2318
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.96820673209731E-01,  1.57884787179657E-01)
-X( 2) = (  5.25339659221797E-01,  1.69515019362328E-01)
-X( 3) = ( -6.85938006230745E-02,  1.33301108887682E+00)
-X( 4) = (  7.75846613670720E-01, -3.00998672651322E-01)
-
-X( 5) = (  9.71369121506166E-02,  2.34850316683462E-01)
-
-PATH NUMBER =      2319
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.11238932902253E+00, -9.58526142163420E-02)
-X( 2) = (  4.07014816587270E-01, -2.17166029260948E-01)
-X( 3) = ( -2.26288353443382E-01,  1.63557504435406E+00)
-X( 4) = (  7.13342620490248E-01, -3.63224058299053E-01)
-
-X( 5) = (  1.22780372724240E-01,  2.19147804071240E-01)
-
-PATH NUMBER =      2320
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.11442524218715E+00, -4.28791601560448E-01)
-X( 2) = (  5.64926515359803E-01, -5.89438640581811E-01)
-X( 3) = ( -5.41573751060030E-01,  1.76598837646755E+00)
-X( 4) = (  7.05459490743929E-01, -4.51068261567772E-01)
-
-X( 5) = (  1.54151600729290E-01,  2.16714701919858E-01)
-
-PATH NUMBER =      2321
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.01975786307203E-01, -6.85146322469674E-01)
-X( 2) = (  9.25186116690683E-01, -7.73112322414012E-01)
-X( 3) = ( -8.66924451921305E-01,  1.66322923773864E+00)
-X( 4) = (  7.55885828451293E-01, -5.23428003468474E-01)
-
-X( 5) = (  1.87871442440642E-01,  2.33133012927398E-01)
-
-PATH NUMBER =      2322
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.74448422901617E-01, -7.44965553965225E-01)
-X( 2) = (  1.31922414927771E+00, -6.82244117722671E-01)
-X( 3) = ( -1.05010524722395E+00,  1.37537977121920E+00)
-X( 4) = (  8.41026589772748E-01, -5.46445356576867E-01)
-
-X( 5) = (  2.09052295629447E-01,  2.77287328461107E-01)
-
-PATH NUMBER =      2323
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.02071349768808E-01, -8.66374150340923E-01)
-X( 2) = (  1.43217943124925E+00, -3.89207825471447E-01)
-X( 3) = ( -1.23798700697921E+00,  1.06955595100950E+00)
-X( 4) = (  1.02741237925412E+00, -1.77132262271826E-01)
-
-X( 5) = (  2.96288927741414E-01,  3.15763230835890E-01)
-
-PATH NUMBER =      2324
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.62863770213226E-02, -5.54210164074094E-01)
-X( 2) = (  1.41111570505711E+00,  1.46229821544505E-02)
-X( 3) = ( -9.86319631938324E-01,  8.39173548289022E-01)
-X( 4) = (  1.06486458509773E+00, -9.72819018470840E-02)
-
-X( 5) = (  2.24232887762441E-01,  3.65239147818134E-01)
-
-PATH NUMBER =      2325
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.98245084614106E-01, -2.40653531182543E-01)
-X( 2) = (  1.13540251510461E+00,  3.10435826086385E-01)
-X( 3) = ( -6.45444283815376E-01,  8.24459059331215E-01)
-X( 4) = (  1.04222781695675E+00, -1.20391630909605E-02)
-
-X( 5) = (  1.55931741741918E-01,  3.35179979268170E-01)
-
-PATH NUMBER =      2326
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.85560748982060E-01, -7.24208849900333E-02)
-X( 2) = (  7.34049127181309E-01,  3.59816589055048E-01)
-X( 3) = ( -3.74860326404597E-01,  1.03229755705277E+00)
-X( 4) = (  9.70094070223991E-01,  3.87099291650404E-02)
-
-X( 5) = (  1.36782680968246E-01,  2.83779850543391E-01)
-
-PATH NUMBER =      2327
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.13795177609493E-01, -1.28230150347637E-01)
-X( 2) = (  3.94853252042563E-01,  1.39659463261351E-01)
-X( 3) = ( -3.01177000584206E-01,  1.36543909850216E+00)
-X( 4) = (  8.82215526673016E-01,  3.12193106410001E-02)
-
-X( 5) = (  1.46540913320250E-01,  2.42842571103722E-01)
-
-PATH NUMBER =      2328
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.02936383342230E+00, -3.81967551743636E-01)
-X( 2) = (  2.76528409408036E-01, -2.47021585361925E-01)
-X( 3) = ( -4.58871553404514E-01,  1.66800305397940E+00)
-X( 4) = (  8.19711533492544E-01, -3.10060750067306E-02)
-
-X( 5) = (  1.70467161706018E-01,  2.15065189482823E-01)
-
-PATH NUMBER =      2329
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.03139974658691E+00, -7.14906539087743E-01)
-X( 2) = (  4.34440108180568E-01, -6.19294196682788E-01)
-X( 3) = ( -7.74156951021163E-01,  1.79841638609288E+00)
-X( 4) = (  8.11828403746225E-01, -1.18850278275449E-01)
-
-X( 5) = (  2.04311713860863E-01,  2.00183001353933E-01)
-
-PATH NUMBER =      2330
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.18950290706964E-01, -9.71261259996968E-01)
-X( 2) = (  7.94699709511449E-01, -8.02967878514989E-01)
-X( 3) = ( -1.09950765188244E+00,  1.69565724736397E+00)
-X( 4) = (  8.62254741453589E-01, -1.91210020176151E-01)
-
-X( 5) = (  2.47331386109316E-01,  2.03249821608736E-01)
-
-PATH NUMBER =      2331
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.91422927301378E-01, -1.03108049149252E+00)
-X( 2) = (  1.18873774209847E+00, -7.12099673823648E-01)
-X( 3) = ( -1.28268844718508E+00,  1.40780778084454E+00)
-X( 4) = (  9.47395502775043E-01, -2.14227373284544E-01)
-
-X( 5) = (  2.91494929891062E-01,  2.39031775498793E-01)
-
-PATH NUMBER =      2332
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.54410065617369E-02, -1.03218314846712E+00)
-X( 2) = (  1.35141182566904E+00, -4.95953554086151E-01)
-X( 3) = ( -1.43700039766622E+00,  9.44895648428137E-01)
-X( 4) = (  8.95350090604778E-01,  1.45734097067153E-01)
-
-X( 5) = (  4.67825230810824E-01,  3.30180756845605E-01)
-
-PATH NUMBER =      2333
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.61225979309222E-01, -7.20019162200294E-01)
-X( 2) = (  1.33034809947691E+00, -9.21227464602537E-02)
-X( 3) = ( -1.18533302262534E+00,  7.14513245707657E-01)
-X( 4) = (  9.32802296448389E-01,  2.25584457491895E-01)
-
-X( 5) = (  3.73347842270462E-01,  4.58699307932203E-01)
-
-PATH NUMBER =      2334
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.92672717164389E-02, -4.06462529308744E-01)
-X( 2) = (  1.05463490952441E+00,  2.03690097471681E-01)
-X( 3) = ( -8.44457674502394E-01,  6.99798756749850E-01)
-X( 4) = (  9.10165528307406E-01,  3.10827196248018E-01)
-
-X( 5) = (  2.39247042856117E-01,  4.30137317530645E-01)
-
-PATH NUMBER =      2335
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.38048392651515E-01, -2.38229883116233E-01)
-X( 2) = (  6.53281521601105E-01,  2.53070860440343E-01)
-X( 3) = ( -5.73873717091614E-01,  9.07637254471403E-01)
-X( 4) = (  8.38031781574651E-01,  3.61576288504019E-01)
-
-X( 5) = (  1.95564668629190E-01,  3.48451346038005E-01)
-
-PATH NUMBER =      2336
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.66282821278948E-01, -2.94039148473836E-01)
-X( 2) = (  3.14085646462359E-01,  3.29137346466466E-02)
-X( 3) = ( -5.00190391271223E-01,  1.24077879592079E+00)
-X( 4) = (  7.50153238023676E-01,  3.54085669979979E-01)
-
-X( 5) = (  2.01817122382772E-01,  2.83289103921890E-01)
-
-PATH NUMBER =      2337
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.81851477091751E-01, -5.47776549869836E-01)
-X( 2) = (  1.95760803827832E-01, -3.53767313976629E-01)
-X( 3) = ( -6.57884944091530E-01,  1.54334275139803E+00)
-X( 4) = (  6.87649244843204E-01,  2.91860284332248E-01)
-
-X( 5) = (  2.29394172095089E-01,  2.36842081863585E-01)
-
-PATH NUMBER =      2338
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.83887390256367E-01, -8.80715537213943E-01)
-X( 2) = (  3.53672502600365E-01, -7.26039925297493E-01)
-X( 3) = ( -9.73170341708180E-01,  1.67375608351152E+00)
-X( 4) = (  6.79766115096885E-01,  2.04016081063529E-01)
-
-X( 5) = (  2.71747896677085E-01,  2.05179851859644E-01)
-
-PATH NUMBER =      2339
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.71437934376419E-01, -1.13707025812317E+00)
-X( 2) = (  7.13932103931245E-01, -9.09713607129693E-01)
-X( 3) = ( -1.29852104256945E+00,  1.57099694478261E+00)
-X( 4) = (  7.30192452804249E-01,  1.31656339162828E-01)
-
-X( 5) = (  3.31694240053897E-01,  1.91703454529699E-01)
-
-PATH NUMBER =      2340
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.43910570970833E-01, -1.19688948961872E+00)
-X( 2) = (  1.10797013651827E+00, -8.18845402438352E-01)
-X( 3) = ( -1.48170183787209E+00,  1.28314747826317E+00)
-X( 4) = (  8.15333214125704E-01,  1.08638986054435E-01)
-
-X( 5) = (  4.11526216586077E-01,  2.17918117963763E-01)
-
-PATH NUMBER =      2341
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.41626441302095E-01, -1.00010233420723E+00)
-X( 2) = (  1.35815508197080E+00, -6.29641942449137E-01)
-X( 3) = ( -1.50932340178920E+00,  7.21476974662831E-01)
-X( 4) = (  5.86650012871679E-01,  3.08176074658190E-01)
-
-X( 5) = (  7.88519562699420E-01,  5.29523241838127E-01)
-
-PATH NUMBER =      2342
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.57411414049580E-01, -6.87938347940401E-01)
-X( 2) = (  1.33709135577866E+00, -2.25811134823239E-01)
-X( 3) = ( -1.25765602674832E+00,  4.91094571942351E-01)
-X( 4) = (  6.24102218715290E-01,  3.88026435082932E-01)
-
-X( 5) = (  4.85823082847088E-01,  8.41509013504266E-01)
-
-PATH NUMBER =      2343
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.45452706456797E-01, -3.74381715048850E-01)
-X( 2) = (  1.06137816582616E+00,  7.00017091086952E-02)
-X( 3) = ( -9.16780678625373E-01,  4.76380082984544E-01)
-X( 4) = (  6.01465450574307E-01,  4.73269173839055E-01)
-
-X( 5) = (  2.14568803947547E-01,  6.68922855115790E-01)
-
-PATH NUMBER =      2344
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.81370420888433E-02, -2.06149068856340E-01)
-X( 2) = (  6.60024777902859E-01,  1.19382472077357E-01)
-X( 3) = ( -6.46196721214594E-01,  6.84218580706097E-01)
-X( 4) = (  5.29331703841552E-01,  5.24018266095056E-01)
-
-X( 5) = (  1.88915361497105E-01,  4.95384445123696E-01)
-
-PATH NUMBER =      2345
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.70097386538590E-01, -2.61958334213943E-01)
-X( 2) = (  3.20828902764112E-01, -1.00774653716339E-01)
-X( 3) = ( -5.72513395394203E-01,  1.01736012215549E+00)
-X( 4) = (  4.41453160290577E-01,  5.16527647571016E-01)
-
-X( 5) = (  2.25956418450491E-01,  3.89267327677336E-01)
-
-PATH NUMBER =      2346
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.85666042351392E-01, -5.15695735609943E-01)
-X( 2) = (  2.02504060129586E-01, -4.87455702339615E-01)
-X( 3) = ( -7.30207948214511E-01,  1.31992407763273E+00)
-X( 4) = (  3.78949167110105E-01,  4.54302261923285E-01)
-
-X( 5) = (  2.82250333242703E-01,  3.18722045045554E-01)
-
-PATH NUMBER =      2347
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.87701955516009E-01, -8.48634722954049E-01)
-X( 2) = (  3.60415758902118E-01, -8.59728313660478E-01)
-X( 3) = ( -1.04549334583116E+00,  1.45033740974621E+00)
-X( 4) = (  3.71066037363786E-01,  3.66458058654566E-01)
-
-X( 5) = (  3.56137658515800E-01,  2.68361458744149E-01)
-
-PATH NUMBER =      2348
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.75252499636061E-01, -1.10498944386327E+00)
-X( 2) = (  7.20675360232998E-01, -1.04340199549268E+00)
-X( 3) = ( -1.37084404669243E+00,  1.34757827101730E+00)
-X( 4) = (  4.21492375071151E-01,  2.94098316753864E-01)
-
-X( 5) = (  4.61455145371047E-01,  2.39510554046237E-01)
-
-PATH NUMBER =      2349
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.22748637695246E-02, -1.16480867535883E+00)
-X( 2) = (  1.11471339282002E+00, -9.52533790801338E-01)
-X( 3) = ( -1.55402484199507E+00,  1.05972880449787E+00)
-X( 4) = (  5.06633136392605E-01,  2.71080963645472E-01)
-
-X( 5) = (  6.25242896600646E-01,  2.71890921050934E-01)
-
-PATH NUMBER =      2350
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.04025353522035E-01, -8.32690185610377E-01)
-X( 2) = (  1.46304947357175E+00, -4.29348296122854E-01)
-X( 3) = ( -1.87416280274791E+00,  2.31892287488038E-01)
-X( 4) = (  4.47396544001330E-01,  4.01785069135940E-01)
-
-X( 5) = (  8.30964811308773E-01,  2.85280083051457E-01)
-
-PATH NUMBER =      2351
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.19810326269520E-01, -5.20526199343548E-01)
-X( 2) = (  1.44198574737961E+00, -2.55174884969564E-02)
-X( 3) = ( -1.62249542770702E+00,  1.50988476755727E-03)
-X( 4) = (  4.84848749844941E-01,  4.81635429560682E-01)
-
-X( 5) = (  7.40509959095346E-01,  6.95956822770862E-01)
-
-PATH NUMBER =      2352
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07851618676737E-01, -2.06969566451997E-01)
-X( 2) = (  1.16627255742711E+00,  2.70295355434978E-01)
-X( 3) = ( -1.28162007958407E+00, -1.32046041902501E-02)
-X( 4) = (  4.62211981703958E-01,  5.66878168316806E-01)
-
-X( 5) = (  3.74561466133226E-01,  6.68912106671337E-01)
-
-PATH NUMBER =      2353
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.20535954308783E-01, -3.87369202594867E-02)
-X( 2) = (  7.64919169503808E-01,  3.19676118403640E-01)
-X( 3) = ( -1.01103612217329E+00,  1.94633893531303E-01)
-X( 4) = (  3.90078234971203E-01,  6.17627260572806E-01)
-
-X( 5) = (  2.77480644441055E-01,  4.90185028755668E-01)
-
-PATH NUMBER =      2354
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07698474318650E-01, -9.45461856170900E-02)
-X( 2) = (  4.25723294365062E-01,  9.95189926099433E-02)
-X( 3) = ( -9.37352796352903E-01,  5.27775434980695E-01)
-X( 4) = (  3.02199691420228E-01,  6.10136642048766E-01)
-
-X( 5) = (  2.83971118609025E-01,  3.67204053557937E-01)
-
-PATH NUMBER =      2355
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.23267130131453E-01, -3.48283587013090E-01)
-X( 2) = (  3.07398451730535E-01, -2.87162056013333E-01)
-X( 3) = ( -1.09504734917321E+00,  8.30339390457936E-01)
-X( 4) = (  2.39695698239755E-01,  5.47911256401035E-01)
-
-X( 5) = (  3.21606587008918E-01,  2.81648800992520E-01)
-
-PATH NUMBER =      2356
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.25303043296069E-01, -6.81222574357196E-01)
-X( 2) = (  4.65310150503068E-01, -6.59434667334196E-01)
-X( 3) = ( -1.41033274678986E+00,  9.60752722571421E-01)
-X( 4) = (  2.31812568493436E-01,  4.60067053132316E-01)
-
-X( 5) = (  3.79291287865560E-01,  2.15418448468089E-01)
-
-PATH NUMBER =      2357
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12853587416121E-01, -9.37577295266422E-01)
-X( 2) = (  8.25569751833949E-01, -8.43108349166397E-01)
-X( 3) = ( -1.73568344765114E+00,  8.57993583842510E-01)
-X( 4) = (  2.82238906200801E-01,  3.87707311231614E-01)
-
-X( 5) = (  4.66457287034119E-01,  1.63340046613135E-01)
-
-PATH NUMBER =      2358
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.14673775989465E-01, -9.97396526761974E-01)
-X( 2) = (  1.21960778442097E+00, -7.52240144475056E-01)
-X( 3) = ( -1.91886424295378E+00,  5.70144117323077E-01)
-X( 4) = (  3.67379667522256E-01,  3.64689958123222E-01)
-
-X( 5) = (  6.11688428926299E-01,  1.45273331749706E-01)
-
-PATH NUMBER =      2359
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.23863979910098E-01, -5.35433698214479E-01)
-X( 2) = (  1.59587778908766E+00, -4.45922230050799E-01)
-X( 3) = ( -1.66669711852548E+00,  1.21871786750486E-01)
-X( 4) = (  2.33817219111050E-01,  1.25982592614209E-01)
-
-X( 5) = (  5.51067985722974E-01,  8.17594463974748E-01)
-
-PATH NUMBER =      2360
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.39648952657583E-01, -2.23269711947650E-01)
-X( 2) = (  1.57481406289553E+00, -4.20914224249021E-02)
-X( 3) = ( -1.41502974348460E+00, -1.08510615969995E-01)
-X( 4) = (  2.71269424954660E-01,  2.05832953038951E-01)
-
-X( 5) = (  1.53066452351418E-01,  8.45378573018243E-01)
-
-PATH NUMBER =      2361
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.27690245064800E-01,  9.02869209439006E-02)
-X( 2) = (  1.29910087294303E+00,  2.53721421507032E-01)
-X( 3) = ( -1.07415439536165E+00, -1.23225104927802E-01)
-X( 4) = (  2.48632656813677E-01,  2.91075691795075E-01)
-
-X( 5) = (  4.89530644780174E-02,  6.17410275421363E-01)
-
-PATH NUMBER =      2362
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.40374580696846E-01,  2.58519567136411E-01)
-X( 2) = (  8.97747485019724E-01,  3.03102184475694E-01)
-X( 3) = ( -8.03570437950869E-01,  8.46133927937512E-02)
-X( 4) = (  1.76498910080922E-01,  3.41824784051075E-01)
-
-X( 5) = (  8.68988695764849E-02,  4.80203932854561E-01)
-
-PATH NUMBER =      2363
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.78598479305871E-02,  2.02710301778808E-01)
-X( 2) = (  5.58551609880977E-01,  8.29450586819976E-02)
-X( 3) = ( -7.29887112130478E-01,  4.17754934243143E-01)
-X( 4) = (  8.86203665299468E-02,  3.34334165527035E-01)
-
-X( 5) = (  1.50045564205351E-01,  4.03909300620155E-01)
-
-PATH NUMBER =      2364
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.03428503743390E-01, -5.10270996171917E-02)
-X( 2) = (  4.40226767246450E-01, -3.03735989941278E-01)
-X( 3) = ( -8.87581664950785E-01,  7.20318889720383E-01)
-X( 4) = (  2.61163733494748E-02,  2.72108779879304E-01)
-
-X( 5) = (  2.22708634452509E-01,  3.58548095000029E-01)
-
-PATH NUMBER =      2365
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.05464416908006E-01, -3.83966086961298E-01)
-X( 2) = (  5.98138466018983E-01, -6.76008601262142E-01)
-X( 3) = ( -1.20286706256743E+00,  8.50732221833869E-01)
-X( 4) = (  1.82332436031557E-02,  1.84264576610585E-01)
-
-X( 5) = (  3.10854395170412E-01,  3.35959998782428E-01)
-
-PATH NUMBER =      2366
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.30149610280584E-02, -6.40320807870524E-01)
-X( 2) = (  9.58398067349864E-01, -8.59682283094343E-01)
-X( 3) = ( -1.52821776342871E+00,  7.47973083104958E-01)
-X( 4) = (  6.86595813105206E-02,  1.11904834709883E-01)
-
-X( 5) = (  4.29457169497796E-01,  3.49750488176963E-01)
-
-PATH NUMBER =      2367
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.34512402377527E-01, -7.00140039366075E-01)
-X( 2) = (  1.35243609993689E+00, -7.68814078403001E-01)
-X( 3) = ( -1.71139855873135E+00,  4.60123616585524E-01)
-X( 4) = (  1.53800342631975E-01,  8.88874816014905E-02)
-
-X( 5) = (  5.82730927716419E-01,  4.71061804694355E-01)
-
-PATH NUMBER =      2368
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.47988462416761E-01, -2.94969994628338E-01)
-X( 2) = (  1.70828370145013E+00, -3.73238204607758E-01)
-X( 3) = ( -1.43704936930341E+00,  1.70947564784631E-01)
-X( 4) = (  2.47488378742778E-01, -2.22580505648404E-01)
-
-X( 5) = (  1.86553280295631E-01,  5.95217073779038E-01)
-
-PATH NUMBER =      2369
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.63773435164247E-01,  1.71939916384917E-02)
-X( 2) = (  1.68721997525800E+00,  3.05926030181387E-02)
-X( 3) = ( -1.18538199426252E+00, -5.94348379358493E-02)
-X( 4) = (  2.84940584586389E-01, -1.42730145223662E-01)
-
-X( 5) = (  3.55155129459622E-02,  5.42900336421284E-01)
-
-PATH NUMBER =      2370
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.51814727571463E-01,  3.30750624530043E-01)
-X( 2) = (  1.41150678530550E+00,  3.26405446950074E-01)
-X( 3) = ( -8.44506646139575E-01, -7.41493268936567E-02)
-X( 4) = (  2.62303816445406E-01, -5.74874064675381E-02)
-
-X( 5) = (  7.61207887696574E-03,  4.34969764768811E-01)
-
-PATH NUMBER =      2371
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.44990632035093E-02,  4.98983270722553E-01)
-X( 2) = (  1.01015339738219E+00,  3.75786209918735E-01)
-X( 3) = ( -5.73922688728796E-01,  1.33689170827897E-01)
-X( 4) = (  1.90170069712651E-01, -6.73831421153750E-03)
-
-X( 5) = (  3.75253880936638E-02,  3.65812785464215E-01)
-
-PATH NUMBER =      2372
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.63735365423924E-01,  4.43174005364949E-01)
-X( 2) = (  6.70957522243446E-01,  1.55629084125038E-01)
-X( 3) = ( -5.00239362908405E-01,  4.66830712277288E-01)
-X( 4) = (  1.02291526161676E-01, -1.42289327355778E-02)
-
-X( 5) = (  8.26224674541944E-02,  3.28330193459096E-01)
-
-PATH NUMBER =      2373
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.79304021236726E-01,  1.89436603968950E-01)
-X( 2) = (  5.52632679608919E-01, -2.31051964498237E-01)
-X( 3) = ( -6.57933915728713E-01,  7.69394667754529E-01)
-X( 4) = (  3.97875329812035E-02, -7.64543183833089E-02)
-
-X( 5) = (  1.34431086395232E-01,  3.12329868889798E-01)
-
-PATH NUMBER =      2374
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.81339934401343E-01, -1.43502383375157E-01)
-X( 2) = (  7.10544378381451E-01, -6.03324575819100E-01)
-X( 3) = ( -9.73219313345361E-01,  8.99807999868014E-01)
-X( 4) = (  3.19044032348843E-02, -1.64298521652028E-01)
-
-X( 5) = (  1.93810469844336E-01,  3.18167604912683E-01)
-
-PATH NUMBER =      2375
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.68890478521395E-01, -3.99857104284382E-01)
-X( 2) = (  1.07080397971233E+00, -7.86998257651302E-01)
-X( 3) = ( -1.29857001420664E+00,  7.97048861139103E-01)
-X( 4) = (  8.23307409422492E-02, -2.36658263552730E-01)
-
-X( 5) = (  2.59006470917663E-01,  3.60889098968038E-01)
-
-PATH NUMBER =      2376
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.86368848841906E-02, -4.59676335779934E-01)
-X( 2) = (  1.46484201229936E+00, -6.96130052959960E-01)
-X( 3) = ( -1.48175080950928E+00,  5.09199394619669E-01)
-X( 4) = (  1.67471502263704E-01, -2.59675616661122E-01)
-
-X( 5) = (  2.93593951035538E-01,  4.71909745072830E-01)
-
-PATH NUMBER =      2377
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.86929103158077E-02, -2.23814714216290E-01)
-X( 2) = (  1.74767123501219E+00, -2.45305883091494E-01)
-X( 3) = ( -1.29267428919313E+00,  3.56156519631779E-01)
-X( 4) = (  4.82013135366815E-01, -4.80807678127490E-01)
-
-X( 5) = (  1.64511769243066E-01,  4.06562674855790E-01)
-
-PATH NUMBER =      2378
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.74477883063293E-01,  8.83492720505392E-02)
-X( 2) = (  1.72660750882006E+00,  1.58524924534404E-01)
-X( 3) = ( -1.04100691415225E+00,  1.25774116911298E-01)
-X( 4) = (  5.19465341210426E-01, -4.00957317702748E-01)
-
-X( 5) = (  8.13780369619379E-02,  3.96895704165747E-01)
-
-PATH NUMBER =      2379
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.25191754705095E-02,  4.01905904942090E-01)
-X( 2) = (  1.45089431886756E+00,  4.54337768466338E-01)
-X( 3) = ( -7.00131566029302E-01,  1.11059627953491E-01)
-X( 4) = (  4.96828573069444E-01, -3.15714578946625E-01)
-
-X( 5) = (  4.90585747865706E-02,  3.39887987651191E-01)
-
-PATH NUMBER =      2380
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.24796488897444E-01,  5.70138551134600E-01)
-X( 2) = (  1.04954093094425E+00,  5.03718531435000E-01)
-X( 3) = ( -4.29547608618522E-01,  3.18898125675044E-01)
-X( 4) = (  4.24694826336688E-01, -2.64965486690624E-01)
-
-X( 5) = (  5.80993242975211E-02,  2.92506707970082E-01)
-
-PATH NUMBER =      2381
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.53030917524877E-01,  5.14329285776996E-01)
-X( 2) = (  7.10345055805505E-01,  2.83561405641304E-01)
-X( 3) = ( -3.55864282798131E-01,  6.52039667124435E-01)
-X( 4) = (  3.36816282785713E-01, -2.72456105214664E-01)
-
-X( 5) = (  8.37583524147082E-02,  2.63375879294347E-01)
-
-PATH NUMBER =      2382
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.68599573337680E-01,  2.60591884380997E-01)
-X( 2) = (  5.92020213170979E-01, -1.03119642981972E-01)
-X( 3) = ( -5.13558835618439E-01,  9.54603622601677E-01)
-X( 4) = (  2.74312289605241E-01, -3.34681490862395E-01)
-
-X( 5) = (  1.16914925460346E-01,  2.49651588591663E-01)
-
-PATH NUMBER =      2383
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.70635486502297E-01, -7.23471029631090E-02)
-X( 2) = (  7.49931911943511E-01, -4.75392254302835E-01)
-X( 3) = ( -8.28844233235087E-01,  1.08501695471516E+00)
-X( 4) = (  2.66429159858922E-01, -4.22525694131114E-01)
-
-X( 5) = (  1.55276341581659E-01,  2.52008837963789E-01)
-
-PATH NUMBER =      2384
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.58186030622349E-01, -3.28701823872335E-01)
-X( 2) = (  1.11019151327439E+00, -6.59065936135036E-01)
-X( 3) = ( -1.15419493409636E+00,  9.82257815986251E-01)
-X( 4) = (  3.16855497566287E-01, -4.94885436031816E-01)
-
-X( 5) = (  1.94698158486435E-01,  2.78227421845285E-01)
-
-PATH NUMBER =      2385
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.30658667216763E-01, -3.88521055367886E-01)
-X( 2) = (  1.50422954586142E+00, -5.68197731443694E-01)
-X( 3) = ( -1.33737572939900E+00,  6.94408349466817E-01)
-X( 4) = (  4.01996258887741E-01, -5.17902789140208E-01)
-
-X( 5) = (  2.13309062394519E-01,  3.39613304184819E-01)
-
-PATH NUMBER =      2386
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.08658072402800E-01, -3.55262203485988E-01)
-X( 2) = (  1.69561052507648E+00, -1.21986220548843E-01)
-X( 3) = ( -1.30112658272854E+00,  5.90837322950695E-01)
-X( 4) = (  8.27654748906436E-01, -5.27871560944738E-01)
-
-X( 5) = (  1.97591297375651E-01,  3.01815555599695E-01)
-
-PATH NUMBER =      2387
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.28730996553149E-02, -4.30982172191587E-02)
-X( 2) = (  1.67454679888434E+00,  2.81844587077055E-01)
-X( 3) = ( -1.04945920768766E+00,  3.60454920230215E-01)
-X( 4) = (  8.65106954750047E-01, -4.48021200519996E-01)
-
-X( 5) = (  1.40877137397010E-01,  3.18931583819207E-01)
-
-PATH NUMBER =      2388
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.04831807248098E-01,  2.70458415672392E-01)
-X( 2) = (  1.39883360893184E+00,  5.77657431008989E-01)
-X( 3) = ( -7.08583859564709E-01,  3.45740431272408E-01)
-X( 4) = (  8.42470186609064E-01, -3.62778461763873E-01)
-
-X( 5) = (  1.00862694448030E-01,  2.88608682964412E-01)
-
-PATH NUMBER =      2389
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.92147471616052E-01,  4.38691061864902E-01)
-X( 2) = (  9.97480221008540E-01,  6.27038193977651E-01)
-X( 3) = ( -4.37999902153930E-01,  5.53578928993961E-01)
-X( 4) = (  7.70336439876309E-01, -3.12029369507872E-01)
-
-X( 5) = (  9.43961227959859E-02,  2.50594713849043E-01)
-
-PATH NUMBER =      2390
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.20381900243486E-01,  3.82881796507299E-01)
-X( 2) = (  6.58284345869793E-01,  4.06881068183955E-01)
-X( 3) = ( -3.64316576333539E-01,  8.86720470443352E-01)
-X( 4) = (  6.82457896325334E-01, -3.19519988031912E-01)
-
-X( 5) = (  1.06993013145967E-01,  2.22159637263019E-01)
-
-PATH NUMBER =      2391
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.03595055605629E+00,  1.29144395111299E-01)
-X( 2) = (  5.39959503235267E-01,  2.02000195606787E-02)
-X( 3) = ( -5.22011129153847E-01,  1.18928442592059E+00)
-X( 4) = (  6.19953903144862E-01, -3.81745373679643E-01)
-
-X( 5) = (  1.29257653455803E-01,  2.04948764280663E-01)
-
-PATH NUMBER =      2392
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.03798646922090E+00, -2.03794592232807E-01)
-X( 2) = (  6.97871202007799E-01, -3.52072591760184E-01)
-X( 3) = ( -8.37296526770494E-01,  1.31969775803408E+00)
-X( 4) = (  6.12070773398543E-01, -4.69589576948362E-01)
-
-X( 5) = (  1.57844035978719E-01,  1.99751292384157E-01)
-
-PATH NUMBER =      2393
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.25537013340957E-01, -4.60149313142033E-01)
-X( 2) = (  1.05813080333868E+00, -5.35746273592386E-01)
-X( 3) = ( -1.16264722763177E+00,  1.21693861930517E+00)
-X( 4) = (  6.62497111105908E-01, -5.41949318849064E-01)
-
-X( 5) = (  1.89860222333733E-01,  2.11409389049252E-01)
-
-PATH NUMBER =      2394
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.98009649935371E-01, -5.19968544637584E-01)
-X( 2) = (  1.45216883592571E+00, -4.44878068901044E-01)
-X( 3) = ( -1.34582802293441E+00,  9.29089152785734E-01)
-X( 4) = (  7.47637872427362E-01, -5.64966671957456E-01)
-
-X( 5) = (  2.13291573860601E-01,  2.48441735655278E-01)
-
-PATH NUMBER =      2395
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.28967989649821E-01, -6.27806721332023E-01)
-X( 2) = (  1.57646135641226E+00, -6.09818576288977E-02)
-X( 3) = ( -1.45845132782763E+00,  7.65180218681855E-01)
-X( 4) = (  1.12268366700781E+00, -3.41750440273162E-01)
-
-X( 5) = (  2.43515112544803E-01,  2.31333832366458E-01)
-
-PATH NUMBER =      2396
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.13183016902336E-01, -3.15642735065194E-01)
-X( 2) = (  1.55539763022012E+00,  3.42848949996999E-01)
-X( 3) = ( -1.20678395278675E+00,  5.34797815961375E-01)
-X( 4) = (  1.16013587285142E+00, -2.61900079848420E-01)
-
-X( 5) = (  2.04855158440583E-01,  2.68146687924878E-01)
-
-PATH NUMBER =      2397
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.25141724495120E-01, -2.08610217364312E-03)
-X( 2) = (  1.27968444026762E+00,  6.38661793928933E-01)
-X( 3) = ( -8.65908604663802E-01,  5.20083327003569E-01)
-X( 4) = (  1.13749910471043E+00, -1.76657341092297E-01)
-
-X( 5) = (  1.57687054311340E-01,  2.58555865633694E-01)
-
-PATH NUMBER =      2398
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.12457388863073E-01,  1.66146544018867E-01)
-X( 2) = (  8.78331052344317E-01,  6.88042556897595E-01)
-X( 3) = ( -5.95324647253023E-01,  7.27921824725121E-01)
-X( 4) = (  1.06536535797768E+00, -1.25908248836296E-01)
-
-X( 5) = (  1.37448705163066E-01,  2.26622435893109E-01)
-
-PATH NUMBER =      2399
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.40691817490507E-01,  1.10337278661264E-01)
-X( 2) = (  5.39135177205571E-01,  4.67885431103899E-01)
-X( 3) = ( -5.21641321432632E-01,  1.06106336617451E+00)
-X( 4) = (  9.77486814426704E-01, -1.33398867360336E-01)
-
-X( 5) = (  1.39378735802260E-01,  1.96599501423694E-01)
-
-PATH NUMBER =      2400
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.15626047330331E+00, -1.43400122734736E-01)
-X( 2) = (  4.20810334571044E-01,  8.12043824806230E-02)
-X( 3) = ( -6.79335874252939E-01,  1.36362732165175E+00)
-X( 4) = (  9.14982821246231E-01, -1.95624253008067E-01)
-
-X( 5) = (  1.53962880723989E-01,  1.74568949698421E-01)
-
-PATH NUMBER =      2401
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.15829638646793E+00, -4.76339110078842E-01)
-X( 2) = (  5.78722033343577E-01, -2.91068228840240E-01)
-X( 3) = ( -9.94621271869588E-01,  1.49404065376524E+00)
-X( 4) = (  9.07099691499913E-01, -2.83468456276786E-01)
-
-X( 5) = (  1.77031972761837E-01,  1.61932991006624E-01)
-
-PATH NUMBER =      2402
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.45846930587977E-01, -7.32693830988067E-01)
-X( 2) = (  9.38981634674458E-01, -4.74741910672441E-01)
-X( 3) = ( -1.31997197273086E+00,  1.39128151503633E+00)
-X( 4) = (  9.57526029207277E-01, -3.55828198177488E-01)
-
-X( 5) = (  2.06734572041268E-01,  1.62371612825770E-01)
-
-PATH NUMBER =      2403
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.18319567182392E-01, -7.92513062483619E-01)
-X( 2) = (  1.33301966726148E+00, -3.83873705981100E-01)
-X( 3) = ( -1.50315276803350E+00,  1.10343204851689E+00)
-X( 4) = (  1.04266679052873E+00, -3.78845551285881E-01)
-
-X( 5) = (  2.36664339813257E-01,  1.84370478592063E-01)
-
-PATH NUMBER =      2404
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.45942494049584E-01, -9.13921658859317E-01)
-X( 2) = (  1.44597494923302E+00, -9.08374137298742E-02)
-X( 3) = ( -1.69103452778877E+00,  7.97608228307192E-01)
-X( 4) = (  1.22905258001010E+00, -9.53245698083932E-03)
-
-X( 5) = (  3.02500534528025E-01,  1.75086081710196E-01)
-
-PATH NUMBER =      2405
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.30157521302098E-01, -6.01757672592488E-01)
-X( 2) = (  1.42491122304089E+00,  3.12993393896023E-01)
-X( 3) = ( -1.43936715274788E+00,  5.67225825586713E-01)
-X( 4) = (  1.26650478585371E+00,  7.03179034439022E-02)
-
-X( 5) = (  2.82243372728582E-01,  2.31682674167142E-01)
-
-PATH NUMBER =      2406
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.42116228894882E-01, -2.88201039700937E-01)
-X( 2) = (  1.14919803308839E+00,  6.08806237827957E-01)
-X( 3) = ( -1.09849180462493E+00,  5.52511336628905E-01)
-X( 4) = (  1.24386801771273E+00,  1.55560642200026E-01)
-
-X( 5) = (  2.26406444283420E-01,  2.44720103089252E-01)
-
-PATH NUMBER =      2407
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.29431893262835E-01, -1.19968393508427E-01)
-X( 2) = (  7.47844645165083E-01,  6.58187000796619E-01)
-X( 3) = ( -8.27907847214154E-01,  7.60349834350458E-01)
-X( 4) = (  1.17173427097997E+00,  2.06309734456026E-01)
-
-X( 5) = (  1.89883169572560E-01,  2.17799334409490E-01)
-
-PATH NUMBER =      2408
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.57666321890269E-01, -1.75777658866030E-01)
-X( 2) = (  4.08648770026337E-01,  4.38029875002922E-01)
-X( 3) = ( -7.54224521393763E-01,  1.09349137579985E+00)
-X( 4) = (  1.08385572742900E+00,  1.98819115931986E-01)
-
-X( 5) = (  1.80620034238023E-01,  1.83957921022204E-01)
-
-PATH NUMBER =      2409
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07323497770307E+00, -4.29515060262030E-01)
-X( 2) = (  2.90323927391810E-01,  5.13488263796464E-02)
-X( 3) = ( -9.11919074214070E-01,  1.39605533127709E+00)
-X( 4) = (  1.02135173424853E+00,  1.36593730284255E-01)
-
-X( 5) = (  1.88434030754105E-01,  1.55351573758268E-01)
-
-PATH NUMBER =      2410
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07527089086769E+00, -7.62454047606136E-01)
-X( 2) = (  4.48235626164343E-01, -3.20923784941217E-01)
-X( 3) = ( -1.22720447183072E+00,  1.52646866339058E+00)
-X( 4) = (  1.01346860450221E+00,  4.87495270155357E-02)
-
-X( 5) = (  2.07720372721446E-01,  1.34423149349150E-01)
-
-PATH NUMBER =      2411
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.62821434987740E-01, -1.01880876851536E+00)
-X( 2) = (  8.08495227495223E-01, -5.04597466773418E-01)
-X( 3) = ( -1.55255517269199E+00,  1.42370952466166E+00)
-X( 4) = (  1.06389494220957E+00, -2.36102148851661E-02)
-
-X( 5) = (  2.37181083849129E-01,  1.24157606846581E-01)
-
-PATH NUMBER =      2412
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.35294071582155E-01, -1.07862800001091E+00)
-X( 2) = (  1.20253326008225E+00, -4.13729262082076E-01)
-X( 3) = ( -1.73573596799463E+00,  1.13586005814223E+00)
-X( 4) = (  1.14903570353103E+00, -4.66275679935585E-02)
-
-X( 5) = (  2.74558820856273E-01,  1.33326094775957E-01)
-
-PATH NUMBER =      2413
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.56986228096105E-03, -1.07973065698552E+00)
-X( 2) = (  1.36520734365282E+00, -1.97583142344580E-01)
-X( 3) = ( -1.89004791847578E+00,  6.72947925725829E-01)
-X( 4) = (  1.09699029136076E+00,  3.13333902358139E-01)
-
-X( 5) = (  3.89268218393452E-01,  1.26715836181161E-01)
-
-PATH NUMBER =      2414
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17354835028447E-01, -7.67566670718688E-01)
-X( 2) = (  1.34414361746068E+00,  2.06247665281317E-01)
-X( 3) = ( -1.63838054343490E+00,  4.42565523005348E-01)
-X( 4) = (  1.13444249720437E+00,  3.93184262782881E-01)
-
-X( 5) = (  3.94308152195882E-01,  2.12978820560629E-01)
-
-PATH NUMBER =      2415
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.39612743566338E-03, -4.54010037827137E-01)
-X( 2) = (  1.06843042750818E+00,  5.02060509213252E-01)
-X( 3) = ( -1.29750519531195E+00,  4.27851034047541E-01)
-X( 4) = (  1.11180572906339E+00,  4.78427001539005E-01)
-
-X( 5) = (  3.20752096463881E-01,  2.59634382889289E-01)
-
-PATH NUMBER =      2416
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.81919536932291E-01, -2.85777391634627E-01)
-X( 2) = (  6.67077039584880E-01,  5.51441272181914E-01)
-X( 3) = ( -1.02692123790117E+00,  6.35689531769094E-01)
-X( 4) = (  1.03967198233064E+00,  5.29176093795005E-01)
-
-X( 5) = (  2.57737479724472E-01,  2.34730976622333E-01)
-
-PATH NUMBER =      2417
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.10153965559724E-01, -3.41586656992230E-01)
-X( 2) = (  3.27881164446133E-01,  3.31284146388217E-01)
-X( 3) = ( -9.53237912080781E-01,  9.68831073218485E-01)
-X( 4) = (  9.51793438779660E-01,  5.21685475270965E-01)
-
-X( 5) = (  2.34260409657053E-01,  1.91005730645965E-01)
-
-PATH NUMBER =      2418
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.25722621372526E-01, -5.95324058388230E-01)
-X( 2) = (  2.09556321811606E-01, -5.53969022350584E-02)
-X( 3) = ( -1.11093246490109E+00,  1.27139502869573E+00)
-X( 4) = (  8.89289445599188E-01,  4.59460089623234E-01)
-
-X( 5) = (  2.35730344376245E-01,  1.51165739956386E-01)
-
-PATH NUMBER =      2419
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.27758534537143E-01, -9.28263045732336E-01)
-X( 2) = (  3.67468020584139E-01, -4.27669513555921E-01)
-X( 3) = ( -1.42621786251774E+00,  1.40180836080921E+00)
-X( 4) = (  8.81406315852869E-01,  3.71615886354515E-01)
-
-X( 5) = (  2.53057499717630E-01,  1.18628917404902E-01)
-
-PATH NUMBER =      2420
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.15309078657195E-01, -1.18461776664156E+00)
-X( 2) = (  7.27727621915020E-01, -6.11343195388123E-01)
-X( 3) = ( -1.75156856337901E+00,  1.29904922208030E+00)
-X( 4) = (  9.31832653560234E-01,  2.99256144453814E-01)
-
-X( 5) = (  2.85001872324606E-01,  9.52960713698828E-02)
-
-PATH NUMBER =      2421
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.87781715251609E-01, -1.24443699813711E+00)
-X( 2) = (  1.12176565450205E+00, -5.20474990696781E-01)
-X( 3) = ( -1.93474935868165E+00,  1.01119975556087E+00)
-X( 4) = (  1.01697341488169E+00,  2.76238791345421E-01)
-
-X( 5) = (  3.33632283223656E-01,  9.00501642925384E-02)
-
-PATH NUMBER =      2422
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.97755297021320E-01, -1.04764984272562E+00)
-X( 2) = (  1.37195059995457E+00, -3.31271530707565E-01)
-X( 3) = ( -1.96237092259876E+00,  4.49529251960522E-01)
-X( 4) = (  7.88290213627663E-01,  4.75775879949177E-01)
-
-X( 5) = (  5.45312951270425E-01,  1.03533768614780E-01)
-
-PATH NUMBER =      2423
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.13540269768805E-01, -7.35485856458794E-01)
-X( 2) = (  1.35088687376244E+00,  7.25592769183322E-02)
-X( 3) = ( -1.71070354755788E+00,  2.19146849240042E-01)
-X( 4) = (  8.25742419471274E-01,  5.55626240373918E-01)
-
-X( 5) = (  5.87800617181733E-01,  2.66862517768226E-01)
-
-PATH NUMBER =      2424
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.01581562176022E-01, -4.21929223567244E-01)
-X( 2) = (  1.07517368380994E+00,  3.68372120850266E-01)
-X( 3) = ( -1.36982819943493E+00,  2.04432360282235E-01)
-X( 4) = (  8.03105651330291E-01,  6.40868979130041E-01)
-
-X( 5) = (  4.44919528765374E-01,  3.69298561522408E-01)
-
-PATH NUMBER =      2425
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.42658978080680E-02, -2.53696577374733E-01)
-X( 2) = (  6.73820295886633E-01,  4.17752883818928E-01)
-X( 3) = ( -1.09924424202415E+00,  4.12270858003788E-01)
-X( 4) = (  7.30971904597536E-01,  6.91618071386042E-01)
-
-X( 5) = (  3.30586260026234E-01,  3.18654418237881E-01)
-
-PATH NUMBER =      2426
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.13968530819365E-01, -3.09505842732337E-01)
-X( 2) = (  3.34624420747887E-01,  1.97595758025232E-01)
-X( 3) = ( -1.02556091620376E+00,  7.45412399453179E-01)
-X( 4) = (  6.43093361046561E-01,  6.84127452862002E-01)
-
-X( 5) = (  2.94210706006982E-01,  2.44369764772157E-01)
-
-PATH NUMBER =      2427
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.29537186632167E-01, -5.63243244128336E-01)
-X( 2) = (  2.16299578113360E-01, -1.89085290598044E-01)
-X( 3) = ( -1.18325546902407E+00,  1.04797635493042E+00)
-X( 4) = (  5.80589367866089E-01,  6.21902067214271E-01)
-
-X( 5) = (  2.95886465856204E-01,  1.81831393964740E-01)
-
-PATH NUMBER =      2428
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.31573099796784E-01, -8.96182231472443E-01)
-X( 2) = (  3.74211276885893E-01, -5.61357901918907E-01)
-X( 3) = ( -1.49854086664072E+00,  1.17838968704390E+00)
-X( 4) = (  5.72706238119770E-01,  5.34057863945553E-01)
-
-X( 5) = (  3.18860643784152E-01,  1.30378453149029E-01)
-
-PATH NUMBER =      2429
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.19123643916836E-01, -1.15253695238167E+00)
-X( 2) = (  7.34470878216773E-01, -7.45031583751108E-01)
-X( 3) = ( -1.82389156750199E+00,  1.07563054831499E+00)
-X( 4) = (  6.23132575827134E-01,  4.61698122044851E-01)
-
-X( 5) = (  3.62566934786998E-01,  8.84680423329771E-02)
-
-PATH NUMBER =      2430
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.40371948874986E-03, -1.21235618387722E+00)
-X( 2) = (  1.12850891080380E+00, -6.54163379059767E-01)
-X( 3) = ( -2.00707236280463E+00,  7.87781081795560E-01)
-X( 4) = (  7.08273337148589E-01,  4.38680768936458E-01)
-
-X( 5) = (  4.36532463838272E-01,  6.50609732292889E-02)
-
-PATH NUMBER =      2431
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.00981056579565E-01, -8.97313518261498E-01)
-X( 2) = (  1.28182864969861E+00, -1.91915712187923E-01)
-X( 3) = ( -2.04641271189738E+00, -2.67645087282516E-01)
-X( 4) = (  4.94130821072925E-01,  6.59785791307576E-01)
-
-X( 5) = (  5.87965535800100E-01, -1.46302569496100E-01)
-
-PATH NUMBER =      2432
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.16766029327050E-01, -5.85149531994669E-01)
-X( 2) = (  1.26076492350648E+00,  2.11915095437974E-01)
-X( 3) = ( -1.79474533685650E+00, -4.98027490002996E-01)
-X( 4) = (  5.31583026916535E-01,  7.39636151732318E-01)
-
-X( 5) = (  8.00462859519378E-01, -6.07066447340463E-02)
-
-PATH NUMBER =      2433
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.04807321734267E-01, -2.71592899103118E-01)
-X( 2) = (  9.85051733553978E-01,  5.07727939369908E-01)
-X( 3) = ( -1.45386998873355E+00, -5.12741978960803E-01)
-X( 4) = (  5.08946258775552E-01,  8.24878890488441E-01)
-
-X( 5) = (  7.81162818811540E-01,  2.48652144431987E-01)
-
-PATH NUMBER =      2434
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.17491657366313E-01, -1.03360252910608E-01)
-X( 2) = (  5.83698345630674E-01,  5.57108702338570E-01)
-X( 3) = ( -1.18328603132277E+00, -3.04903481239250E-01)
-X( 4) = (  4.36812512042797E-01,  8.75627982744442E-01)
-
-X( 5) = (  5.46198443909319E-01,  3.03161936098200E-01)
-
-PATH NUMBER =      2435
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.10742771261121E-01, -1.59169518268211E-01)
-X( 2) = (  2.44502470491927E-01,  3.36951576544874E-01)
-X( 3) = ( -1.10960270550238E+00,  2.82380602101424E-02)
-X( 4) = (  3.48933968491822E-01,  8.68137364220402E-01)
-
-X( 5) = (  4.31343136578013E-01,  2.19076478264149E-01)
-
-PATH NUMBER =      2436
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.26311427073923E-01, -4.12906919664211E-01)
-X( 2) = (  1.26177627857400E-01, -4.97294720784022E-02)
-X( 3) = ( -1.26729725832269E+00,  3.30802015687383E-01)
-X( 4) = (  2.86429975311350E-01,  8.05911978572671E-01)
-
-X( 5) = (  3.92719322168814E-01,  1.32863669301448E-01)
-
-PATH NUMBER =      2437
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.28347340238540E-01, -7.45845907008317E-01)
-X( 2) = (  2.84089326629933E-01, -4.22002083399265E-01)
-X( 3) = ( -1.58258265593934E+00,  4.61215347800868E-01)
-X( 4) = (  2.78546845565031E-01,  7.18067775303951E-01)
-
-X( 5) = (  3.88926938787488E-01,  5.62223489657214E-02)
-
-PATH NUMBER =      2438
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.15897884358592E-01, -1.00220062791754E+00)
-X( 2) = (  6.44348927960813E-01, -6.05675765231467E-01)
-X( 3) = ( -1.90793335680061E+00,  3.58456209071958E-01)
-X( 4) = (  3.28973183272396E-01,  6.45708033403250E-01)
-
-X( 5) = (  4.10038742795590E-01, -1.67414750562826E-02)
-
-PATH NUMBER =      2439
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.11629479046994E-01, -1.06201985941309E+00)
-X( 2) = (  1.03838696054784E+00, -5.14807560540125E-01)
-X( 3) = ( -2.09111415210325E+00,  7.06067425525245E-02)
-X( 4) = (  4.14113944593851E-01,  6.22690680294857E-01)
-
-X( 5) = (  4.65109143424936E-01, -8.98938183402076E-02)
-
-PATH NUMBER =      2440
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.20819682967627E-01, -6.00057030865600E-01)
-X( 2) = (  1.41465696521453E+00, -2.08489646115869E-01)
-X( 3) = ( -1.83894702767496E+00, -3.77665588020067E-01)
-X( 4) = (  2.80551496182644E-01,  3.83983314785845E-01)
-
-X( 5) = (  9.11735068062208E-01,  6.08800972097482E-02)
-
-PATH NUMBER =      2441
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.36604655715113E-01, -2.87893044598771E-01)
-X( 2) = (  1.39359323902239E+00,  1.95341161510028E-01)
-X( 3) = ( -1.58727965263407E+00, -6.08047990740548E-01)
-X( 4) = (  3.18003702026255E-01,  4.63833675210587E-01)
-
-X( 5) = (  1.07904233930725E+00,  5.55738475502986E-01)
-
-PATH NUMBER =      2442
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.24645948122330E-01,  2.56635882927796E-02)
-X( 2) = (  1.11788004906989E+00,  4.91154005441962E-01)
-X( 3) = ( -1.24640430451113E+00, -6.22762479698355E-01)
-X( 4) = (  2.95366933885272E-01,  5.49076413966710E-01)
-
-X( 5) = (  5.75557155877905E-01,  7.41989858962493E-01)
-
-PATH NUMBER =      2443
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.37330283754376E-01,  1.93896234485290E-01)
-X( 2) = (  7.16526661146589E-01,  5.40534768410624E-01)
-X( 3) = ( -9.75820347100346E-01, -4.14923981976801E-01)
-X( 4) = (  2.23233187152517E-01,  5.99825506222711E-01)
-
-X( 5) = (  3.78662534283932E-01,  5.31122039577066E-01)
-
-PATH NUMBER =      2444
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.09041448730578E-02,  1.38086969127687E-01)
-X( 2) = (  3.77330786007843E-01,  3.20377642616928E-01)
-X( 3) = ( -9.02137021279955E-01, -8.17824405274098E-02)
-X( 4) = (  1.35354643601542E-01,  5.92334887698670E-01)
-
-X( 5) = (  3.54729821158999E-01,  3.74469154445778E-01)
-
-PATH NUMBER =      2445
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.06472800685860E-01, -1.15650432268312E-01)
-X( 2) = (  2.59005943373316E-01, -6.63034060063479E-02)
-X( 3) = ( -1.05983157410026E+00,  2.20781514949831E-01)
-X( 4) = (  7.28506504210695E-02,  5.30109502050939E-01)
-
-X( 5) = (  3.77708546848478E-01,  2.64785034011744E-01)
-
-PATH NUMBER =      2446
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.08508713850477E-01, -4.48589419612419E-01)
-X( 2) = (  4.16917642145849E-01, -4.38576017327211E-01)
-X( 3) = ( -1.37511697171691E+00,  3.51194847063316E-01)
-X( 4) = (  6.49675206747504E-02,  4.42265298782220E-01)
-
-X( 5) = (  4.24380695354837E-01,  1.76505280406655E-01)
-
-PATH NUMBER =      2447
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.60592579705292E-02, -7.04944140521645E-01)
-X( 2) = (  7.77177243476729E-01, -6.22249699159412E-01)
-X( 3) = ( -1.70046767257819E+00,  2.48435708334405E-01)
-X( 4) = (  1.15393858382115E-01,  3.69905556881519E-01)
-
-X( 5) = (  5.00761272818679E-01,  9.67759252548548E-02)
-
-PATH NUMBER =      2448
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.31468105435057E-01, -7.64763372017196E-01)
-X( 2) = (  1.17121527606376E+00, -5.31381494468071E-01)
-X( 3) = ( -1.88364846788083E+00, -3.94137581850288E-02)
-X( 4) = (  2.00534619703570E-01,  3.46888203773126E-01)
-
-X( 5) = (  6.38508859229826E-01,  2.89475119873752E-02)
-
-PATH NUMBER =      2449
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.44944165474291E-01, -3.59593327279459E-01)
-X( 2) = (  1.52706287757700E+00, -1.35805620672829E-01)
-X( 3) = ( -1.60929927845288E+00, -3.28589809985922E-01)
-X( 4) = (  2.94222655814373E-01,  3.54202165232321E-02)
-
-X( 5) = (  6.32087042493972E-01,  4.79263483471551E-01)
-
-PATH NUMBER =      2450
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.60729138221776E-01, -4.74293410126291E-02)
-X( 2) = (  1.50599915138486E+00,  2.68025186953069E-01)
-X( 3) = ( -1.35763190341200E+00, -5.58972212706403E-01)
-X( 4) = (  3.31674861657983E-01,  1.15270576947974E-01)
-
-X( 5) = (  4.15512647169971E-01,  6.86653141414366E-01)
-
-PATH NUMBER =      2451
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.48770430628993E-01,  2.66127291878921E-01)
-X( 2) = (  1.23028596143236E+00,  5.63838030885003E-01)
-X( 3) = ( -1.01675655528905E+00, -5.73686701664209E-01)
-X( 4) = (  3.09038093517000E-01,  2.00513315704097E-01)
-
-X( 5) = (  2.12434806673246E-01,  5.75033153241175E-01)
-
-PATH NUMBER =      2452
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.14547662610388E-02,  4.34359938071432E-01)
-X( 2) = (  8.28932573509057E-01,  6.13218793853665E-01)
-X( 3) = ( -7.46172597878273E-01, -3.65848203942656E-01)
-X( 4) = (  2.36904346784245E-01,  2.51262407960098E-01)
-
-X( 5) = (  1.82556547473680E-01,  4.40608632697168E-01)
-
-PATH NUMBER =      2453
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.66779662366395E-01,  3.78550672713829E-01)
-X( 2) = (  4.89736698370311E-01,  3.93061668059969E-01)
-X( 3) = ( -6.72489272057882E-01, -3.27066624932645E-02)
-X( 4) = (  1.49025803233270E-01,  2.43771789436058E-01)
-
-X( 5) = (  2.09519886606571E-01,  3.52523441008430E-01)
-
-PATH NUMBER =      2454
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.82348318179197E-01,  1.24813271317829E-01)
-X( 2) = (  3.71411855735784E-01,  6.38061943669280E-03)
-X( 3) = ( -8.30183824878189E-01,  2.69857292983976E-01)
-X( 4) = (  8.65218100527982E-02,  1.81546403788327E-01)
-
-X( 5) = (  2.56273619674035E-01,  2.93541059859244E-01)
-
-PATH NUMBER =      2455
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.84384231343813E-01, -2.08125716026278E-01)
-X( 2) = (  5.29323554508317E-01, -3.65891991884170E-01)
-X( 3) = ( -1.14546922249484E+00,  4.00270625097461E-01)
-X( 4) = (  7.86386803064791E-02,  9.37022005196077E-02)
-
-X( 5) = (  3.19422090773807E-01,  2.53391684751339E-01)
-
-PATH NUMBER =      2456
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.71934775463865E-01, -4.64480436935504E-01)
-X( 2) = (  8.89583155839198E-01, -5.49565673716371E-01)
-X( 3) = ( -1.47081992335611E+00,  2.97511486368550E-01)
-X( 4) = (  1.29065018013844E-01,  2.13424586189065E-02)
-
-X( 5) = (  4.08162645574089E-01,  2.35611276842059E-01)
-
-PATH NUMBER =      2457
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.55925879417205E-02, -5.24299668431055E-01)
-X( 2) = (  1.28362118842622E+00, -4.58697469025030E-01)
-X( 3) = ( -1.65400071865875E+00,  9.66201984911625E-03)
-X( 4) = (  2.14205779335298E-01, -1.67489448948619E-03)
-
-X( 5) = (  5.35735638993497E-01,  2.75798878306201E-01)
-
-PATH NUMBER =      2458
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.56486133733367E-02, -2.88438046867411E-01)
-X( 2) = (  1.56645041113906E+00, -7.87329915656297E-03)
-X( 3) = ( -1.46492419834261E+00, -1.43380855138774E-01)
-X( 4) = (  5.28747412438411E-01, -2.22806955955855E-01)
-
-X( 5) = (  3.71497189815111E-01,  3.62116699827401E-01)
-
-PATH NUMBER =      2459
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.71433586120822E-01,  2.37259393994182E-02)
-X( 2) = (  1.54538668494692E+00,  3.95957508469335E-01)
-X( 3) = ( -1.21325682330173E+00, -3.73763257859255E-01)
-X( 4) = (  5.66199618282021E-01, -1.42956595531113E-01)
-
-X( 5) = (  2.71216785816965E-01,  4.38317568207647E-01)
-
-PATH NUMBER =      2460
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.94748785280391E-02,  3.37282572290969E-01)
-X( 2) = (  1.26967349499442E+00,  6.91770352401268E-01)
-X( 3) = ( -8.72381475178779E-01, -3.88477746817061E-01)
-X( 4) = (  5.43562850141038E-01, -5.77138567749894E-02)
-
-X( 5) = (  1.75751835412491E-01,  3.94801203491690E-01)
-
-PATH NUMBER =      2461
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.27840785839915E-01,  5.05515218483479E-01)
-X( 2) = (  8.68320107071118E-01,  7.41151115369930E-01)
-X( 3) = ( -6.01797517767999E-01, -1.80639249095508E-01)
-X( 4) = (  4.71429103408283E-01, -6.96476451898874E-03)
-
-X( 5) = (  1.52178664167329E-01,  3.25556466188974E-01)
-
-PATH NUMBER =      2462
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.56075214467348E-01,  4.49705953125876E-01)
-X( 2) = (  5.29124231932371E-01,  5.20993989576234E-01)
-X( 3) = ( -5.28114191947608E-01,  1.52502292353883E-01)
-X( 4) = (  3.83550559857308E-01, -1.44553830430291E-02)
-
-X( 5) = (  1.65268398688519E-01,  2.73130645029898E-01)
-
-PATH NUMBER =      2463
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.71643870280151E-01,  1.95968551729877E-01)
-X( 2) = (  4.10799389297844E-01,  1.34312940952958E-01)
-X( 3) = ( -6.85808744767915E-01,  4.55066247831124E-01)
-X( 4) = (  3.21046566676836E-01, -7.66807686907600E-02)
-
-X( 5) = (  1.94794130586818E-01,  2.37599614841283E-01)
-
-PATH NUMBER =      2464
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.73679783444767E-01, -1.36970435614230E-01)
-X( 2) = (  5.68711088070377E-01, -2.37959670367905E-01)
-X( 3) = ( -1.00109414238456E+00,  5.85479579944609E-01)
-X( 4) = (  3.13163436930517E-01, -1.64524971959479E-01)
-
-X( 5) = (  2.36310803169890E-01,  2.16850123640685E-01)
-
-PATH NUMBER =      2465
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.61230327564820E-01, -3.93325156523456E-01)
-X( 2) = (  9.28970689401258E-01, -4.21633352200106E-01)
-X( 3) = ( -1.32644484324584E+00,  4.82720441215698E-01)
-X( 4) = (  3.63589774637882E-01, -2.36884713860181E-01)
-
-X( 5) = (  2.91089864869129E-01,  2.16279701764166E-01)
-
-PATH NUMBER =      2466
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.33702964159234E-01, -4.53144388019007E-01)
-X( 2) = (  1.32300872198828E+00, -3.30765147508765E-01)
-X( 3) = ( -1.50962563854848E+00,  1.94870974696265E-01)
-X( 4) = (  4.48730535959336E-01, -2.59902066968573E-01)
-
-X( 5) = (  3.53836786822807E-01,  2.56762282226420E-01)
-
-PATH NUMBER =      2467
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.11702369345271E-01, -4.19885536137109E-01)
-X( 2) = (  1.51438970120334E+00,  1.15446363386087E-01)
-X( 3) = ( -1.47337649187802E+00,  9.12999481801430E-02)
-X( 4) = (  8.74389025978031E-01, -2.69870838773103E-01)
-
-X( 5) = (  3.10474680060587E-01,  2.35675798511705E-01)
-
-PATH NUMBER =      2468
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.59173965977856E-02, -1.07721549870280E-01)
-X( 2) = (  1.49332597501121E+00,  5.19277171011985E-01)
-X( 3) = ( -1.22170911683713E+00, -1.39082454540338E-01)
-X( 4) = (  9.11841231821642E-01, -1.90020478348361E-01)
-
-X( 5) = (  2.68212438729749E-01,  2.95529272517142E-01)
-
-PATH NUMBER =      2469
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.07876104190569E-01,  2.05835083021271E-01)
-X( 2) = (  1.21761278505871E+00,  8.15090014943919E-01)
-X( 3) = ( -8.80833768714186E-01, -1.53796943498145E-01)
-X( 4) = (  8.89204463680659E-01, -1.04777739592237E-01)
-
-X( 5) = (  2.01677497162475E-01,  2.91625405646151E-01)
-
-PATH NUMBER =      2470
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.95191768558523E-01,  3.74067729213781E-01)
-X( 2) = (  8.16259397135406E-01,  8.64470777912581E-01)
-X( 3) = ( -6.10249811303406E-01,  5.40415542234087E-02)
-X( 4) = (  8.17070716947904E-01, -5.40286473362367E-02)
-
-X( 5) = (  1.70113574262973E-01,  2.51874348566185E-01)
-
-PATH NUMBER =      2471
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.23426197185956E-01,  3.18258463856178E-01)
-X( 2) = (  4.77063521996659E-01,  6.44313652118885E-01)
-X( 3) = ( -5.36566485483015E-01,  3.87183095672800E-01)
-X( 4) = (  7.29192173396929E-01, -6.15192658602771E-02)
-
-X( 5) = (  1.68650797470784E-01,  2.13007929670741E-01)
-
-PATH NUMBER =      2472
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.03899485299876E+00,  6.45210624601789E-02)
-X( 2) = (  3.58738679362132E-01,  2.57632603495609E-01)
-X( 3) = ( -6.94261038303323E-01,  6.89747051150041E-01)
-X( 4) = (  6.66688180216456E-01, -1.23744651508008E-01)
-
-X( 5) = (  1.83643753465063E-01,  1.83375001924670E-01)
-
-PATH NUMBER =      2473
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.04103076616338E+00, -2.68417924883928E-01)
-X( 2) = (  5.16650378134666E-01, -1.14640007825254E-01)
-X( 3) = ( -1.00954643591997E+00,  8.20160383263527E-01)
-X( 4) = (  6.58805050470138E-01, -2.11588854776727E-01)
-
-X( 5) = (  2.09699946850253E-01,  1.63895435542628E-01)
-
-PATH NUMBER =      2474
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.28581310283427E-01, -5.24772645793154E-01)
-X( 2) = (  8.76909979465545E-01, -2.98313689657455E-01)
-X( 3) = ( -1.33489713678125E+00,  7.17401244534615E-01)
-X( 4) = (  7.09231388177502E-01, -2.83948596677428E-01)
-
-X( 5) = (  2.45901161785768E-01,  1.58168279270837E-01)
-
-PATH NUMBER =      2475
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.01053946877842E-01, -5.84591877288705E-01)
-X( 2) = (  1.27094801205257E+00, -2.07445484966114E-01)
-X( 3) = ( -1.51807793208389E+00,  4.29551778015182E-01)
-X( 4) = (  7.94372149498957E-01, -3.06965949785821E-01)
-
-X( 5) = (  2.88285702751645E-01,  1.77605814265466E-01)
-
-PATH NUMBER =      2476
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.32012286592292E-01, -6.92430053983144E-01)
-X( 2) = (  1.39524053253912E+00,  1.76450726306032E-01)
-X( 3) = ( -1.63070123697711E+00,  2.65642843911303E-01)
-X( 4) = (  1.16941794407940E+00, -8.37497181015265E-02)
-
-X( 5) = (  3.03354924442388E-01,  1.44967168556425E-01)
-
-PATH NUMBER =      2477
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.16227313844807E-01, -3.80266067716315E-01)
-X( 2) = (  1.37417680634699E+00,  5.80281533931929E-01)
-X( 3) = ( -1.37903386193623E+00,  3.52604411908225E-02)
-X( 4) = (  1.20687014992301E+00, -3.89935767678460E-03)
-
-X( 5) = (  2.93472219034101E-01,  2.00364162726721E-01)
-
-PATH NUMBER =      2478
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.28186021437590E-01, -6.67094348247640E-02)
-X( 2) = (  1.09846361639449E+00,  8.76094377863863E-01)
-X( 3) = ( -1.03815851381328E+00,  2.05459522330154E-02)
-X( 4) = (  1.18423338178203E+00,  8.13433810793387E-02)
-
-X( 5) = (  2.42801008652830E-01,  2.21878269473004E-01)
-
-PATH NUMBER =      2479
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.15501685805544E-01,  1.01523211367747E-01)
-X( 2) = (  6.97110228471183E-01,  9.25475140832525E-01)
-X( 3) = ( -7.67574556402499E-01,  2.28384449954569E-01)
-X( 4) = (  1.11209963504927E+00,  1.32092473335339E-01)
-
-X( 5) = (  2.03421801671921E-01,  2.01469720567403E-01)
-
-PATH NUMBER =      2480
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.43736114432978E-01,  4.57139460101433E-02)
-X( 2) = (  3.57914353332437E-01,  7.05318015038829E-01)
-X( 3) = ( -6.93891230582108E-01,  5.61525991403960E-01)
-X( 4) = (  1.02422109149830E+00,  1.24601854811299E-01)
-
-X( 5) = (  1.89882882854649E-01,  1.69891205579778E-01)
-
-PATH NUMBER =      2481
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.15930477024578E+00, -2.08023455385856E-01)
-X( 2) = (  2.39589510697910E-01,  3.18636966415553E-01)
-X( 3) = ( -8.51585783402416E-01,  8.64089946881201E-01)
-X( 4) = (  9.61717098317826E-01,  6.23764691635678E-02)
-
-X( 5) = (  1.93969665539280E-01,  1.41378014905441E-01)
-
-PATH NUMBER =      2482
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.16134068341040E+00, -5.40962442729963E-01)
-X( 2) = (  3.97501209470443E-01, -5.36356449053099E-02)
-X( 3) = ( -1.16687118101907E+00,  9.94503278994686E-01)
-X( 4) = (  9.53833968571507E-01, -2.54677341051508E-02)
-
-X( 5) = (  2.09991494995236E-01,  1.19271498038402E-01)
-
-PATH NUMBER =      2483
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.48891227530448E-01, -7.97317163639188E-01)
-X( 2) = (  7.57760810801323E-01, -2.37309326737510E-01)
-X( 3) = ( -1.49222188188034E+00,  8.91744140265775E-01)
-X( 4) = (  1.00426030627887E+00, -9.78274760058524E-02)
-
-X( 5) = (  2.36518223466778E-01,  1.06368227348622E-01)
-
-PATH NUMBER =      2484
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.21363864124863E-01, -8.57136395134740E-01)
-X( 2) = (  1.15179884338835E+00, -1.46441122046169E-01)
-X( 3) = ( -1.67540267718298E+00,  6.03894673746341E-01)
-X( 4) = (  1.08940106760033E+00, -1.20844829114244E-01)
-
-X( 5) = (  2.72161239505514E-01,  1.10464474906095E-01)
-
-PATH NUMBER =      2485
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.48986790992054E-01, -9.78544991510438E-01)
-X( 2) = (  1.26475412535989E+00,  1.46595170205055E-01)
-X( 3) = ( -1.86328443693824E+00,  2.98070853536640E-01)
-X( 4) = (  1.27578685708170E+00,  2.48468265190796E-01)
-
-X( 5) = (  3.17590914146729E-01,  7.03809891370996E-02)
-
-PATH NUMBER =      2486
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.33201818244569E-01, -6.66381005243609E-01)
-X( 2) = (  1.24369039916775E+00,  5.50425977830953E-01)
-X( 3) = ( -1.61161706189736E+00,  6.76884508161591E-02)
-X( 4) = (  1.31323906292531E+00,  3.28318625615538E-01)
-
-X( 5) = (  3.33603335017950E-01,  1.22418690840741E-01)
-
-PATH NUMBER =      2487
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.45160525837352E-01, -3.52824372352058E-01)
-X( 2) = (  9.67977209215254E-01,  8.46238821762887E-01)
-X( 3) = ( -1.27074171377441E+00,  5.29739618583524E-02)
-X( 4) = (  1.29060229478432E+00,  4.13561364371662E-01)
-
-X( 5) = (  2.97240752039479E-01,  1.66325219587212E-01)
-
-PATH NUMBER =      2488
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.32476190205306E-01, -1.84591726159547E-01)
-X( 2) = (  5.66623821291949E-01,  8.95619584731549E-01)
-X( 3) = ( -1.00015775636363E+00,  2.60812459579906E-01)
-X( 4) = (  1.21846854805157E+00,  4.64310456627661E-01)
-
-X( 5) = (  2.49411853198928E-01,  1.63982731578911E-01)
-
-PATH NUMBER =      2489
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.60710618832739E-01, -2.40400991517151E-01)
-X( 2) = (  2.27427946153203E-01,  6.75462458937852E-01)
-X( 3) = ( -9.26474430543240E-01,  5.93954001029297E-01)
-X( 4) = (  1.13059000450059E+00,  4.56819838103621E-01)
-
-X( 5) = (  2.23424524002153E-01,  1.37781047127123E-01)
-
-PATH NUMBER =      2490
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07627927464554E+00, -4.94138392913151E-01)
-X( 2) = (  1.09103103518676E-01,  2.88781410314577E-01)
-X( 3) = ( -1.08416898336355E+00,  8.96517956506538E-01)
-X( 4) = (  1.06808601132012E+00,  3.94594452455891E-01)
-
-X( 5) = (  2.17389292240169E-01,  1.08363035555969E-01)
-
-PATH NUMBER =      2491
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07831518781016E+00, -8.27077380257257E-01)
-X( 2) = (  2.67014802291209E-01, -8.34912010062865E-02)
-X( 3) = ( -1.39945438098020E+00,  1.02693128862002E+00)
-X( 4) = (  1.06020288157380E+00,  3.06750249187171E-01)
-
-X( 5) = (  2.25302858969763E-01,  8.20953279931663E-02)
-
-PATH NUMBER =      2492
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.65865731930210E-01, -1.08343210116648E+00)
-X( 2) = (  6.27274403622089E-01, -2.67164882838487E-01)
-X( 3) = ( -1.72480508184147E+00,  9.24172149891112E-01)
-X( 4) = (  1.11062921928117E+00,  2.34390507286471E-01)
-
-X( 5) = (  2.45284181515862E-01,  6.16811411335856E-02)
-
-PATH NUMBER =      2493
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.38338368524625E-01, -1.14325133266203E+00)
-X( 2) = (  1.02131243620911E+00, -1.76296678147146E-01)
-X( 3) = ( -1.90798587714411E+00,  6.36322683371678E-01)
-X( 4) = (  1.19576998060262E+00,  2.11373154178078E-01)
-
-X( 5) = (  2.77861096224833E-01,  5.30595542967083E-02)
-
-PATH NUMBER =      2494
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.47443466150965E-03, -1.14435398963664E+00)
-X( 2) = (  1.18398651977968E+00,  3.98494415903511E-02)
-X( 3) = ( -2.06229782762526E+00,  1.73410550955276E-01)
-X( 4) = (  1.14372456843236E+00,  5.71334624529775E-01)
-
-X( 5) = (  3.51133860393991E-01, -1.47881150305870E-03)
-
-PATH NUMBER =      2495
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14310538085976E-01, -8.32190003369809E-01)
-X( 2) = (  1.16292279358755E+00,  4.43680249216248E-01)
-X( 3) = ( -1.81063045258438E+00, -5.69718517652047E-02)
-X( 4) = (  1.18117677427597E+00,  6.51184984954516E-01)
-
-X( 5) = (  3.96396490433573E-01,  4.65679458203628E-02)
-
-PATH NUMBER =      2496
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.35183049319261E-03, -5.18633370478258E-01)
-X( 2) = (  8.87209603635050E-01,  7.39493093148182E-01)
-X( 3) = ( -1.46975510446143E+00, -7.16863407230118E-02)
-X( 4) = (  1.15854000613499E+00,  7.36427723710640E-01)
-
-X( 5) = (  3.77894645054353E-01,  1.18693556194396E-01)
-
-PATH NUMBER =      2497
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.84963833874761E-01, -3.50400724285748E-01)
-X( 2) = (  4.85856215711745E-01,  7.88873856116844E-01)
-X( 3) = ( -1.19917114705065E+00,  1.36152156998542E-01)
-X( 4) = (  1.08640625940223E+00,  7.87176815966640E-01)
-
-X( 5) = (  3.16712275258703E-01,  1.39257445460744E-01)
-
-PATH NUMBER =      2498
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.13198262502195E-01, -4.06209989643351E-01)
-X( 2) = (  1.46660340572999E-01,  5.68716730323148E-01)
-X( 3) = ( -1.12548782123026E+00,  4.69293698447933E-01)
-X( 4) = (  9.98527715851255E-01,  7.79686197442601E-01)
-
-X( 5) = (  2.73567341852057E-01,  1.17120254548313E-01)
-
-PATH NUMBER =      2499
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.28766918314997E-01, -6.59947391039350E-01)
-X( 2) = (  2.83354979384722E-02,  1.82035681699872E-01)
-X( 3) = ( -1.28318237405057E+00,  7.71857653925174E-01)
-X( 4) = (  9.36023722670783E-01,  7.17460811794869E-01)
-
-X( 5) = (  2.55633804880918E-01,  8.39446075064001E-02)
-
-PATH NUMBER =      2500
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.30802831479613E-01, -9.92886378383457E-01)
-X( 2) = (  1.86247196711005E-01, -1.90236929620991E-01)
-X( 3) = ( -1.59846777166721E+00,  9.02270986038659E-01)
-X( 4) = (  9.28140592924463E-01,  6.29616608526150E-01)
-
-X( 5) = (  2.55463637864196E-01,  5.09331997312256E-02)
-
-PATH NUMBER =      2501
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.18353375599667E-01, -1.24924109929268E+00)
-X( 2) = (  5.46506798041885E-01, -3.73910611453192E-01)
-X( 3) = ( -1.92381847252849E+00,  7.99511847309749E-01)
-X( 4) = (  9.78566930631829E-01,  5.57256866625448E-01)
-
-X( 5) = (  2.70023385169878E-01,  2.10624676188811E-02)
-
-PATH NUMBER =      2502
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.90826012194080E-01, -1.30906033078823E+00)
-X( 2) = (  9.40544830628912E-01, -2.83042406761850E-01)
-X( 3) = ( -2.10699926783113E+00,  5.11662380790314E-01)
-X( 4) = (  1.06370769195328E+00,  5.34239513517056E-01)
-
-X( 5) = (  3.01302730524414E-01, -1.27548909444314E-03)
-
-PATH NUMBER =      2503
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.94711000078848E-01, -1.11227317537674E+00)
-X( 2) = (  1.19072977608144E+00, -9.38389467726347E-02)
-X( 3) = ( -2.13462083174824E+00, -5.00081228100294E-02)
-X( 4) = (  8.35024490699259E-01,  7.33776602120811E-01)
-
-X( 5) = (  4.20800831952185E-01, -7.92176401042303E-02)
-
-PATH NUMBER =      2504
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.10495972826334E-01, -8.00109189109916E-01)
-X( 2) = (  1.16966604988930E+00,  3.09991860853262E-01)
-X( 3) = ( -1.88295345670736E+00, -2.80390525530510E-01)
-X( 4) = (  8.72476696542869E-01,  8.13626962545553E-01)
-
-X( 5) = (  5.14394971920357E-01, -3.39461701913238E-02)
-
-PATH NUMBER =      2505
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.98537265233551E-01, -4.86552556218365E-01)
-X( 2) = (  8.93952859936804E-01,  6.05804704785197E-01)
-X( 3) = ( -1.54207810858441E+00, -2.95105014488318E-01)
-X( 4) = (  8.49839928401887E-01,  8.98869701301677E-01)
-
-X( 5) = (  5.21692203062321E-01,  9.45823109939261E-02)
-
-PATH NUMBER =      2506
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12216008655968E-02, -3.18319910025854E-01)
-X( 2) = (  4.92599472013499E-01,  6.55185467753859E-01)
-X( 3) = ( -1.27149415117363E+00, -8.72665167667643E-02)
-X( 4) = (  7.77706181669132E-01,  9.49618793557678E-01)
-
-X( 5) = (  4.24251087815656E-01,  1.50664174779552E-01)
-
-PATH NUMBER =      2507
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.17012827761836E-01, -3.74129175383458E-01)
-X( 2) = (  1.53403596874753E-01,  4.35028341960162E-01)
-X( 3) = ( -1.19781082535324E+00,  2.45875024682627E-01)
-X( 4) = (  6.89827638118156E-01,  9.42128175033637E-01)
-
-X( 5) = (  3.49953000565013E-01,  1.24517589519950E-01)
-
-PATH NUMBER =      2508
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.32581483574639E-01, -6.27866576779457E-01)
-X( 2) = (  3.50787542402259E-02,  4.83472933368868E-02)
-X( 3) = ( -1.35550537817354E+00,  5.48438980159867E-01)
-X( 4) = (  6.27323644937684E-01,  8.79902789385906E-01)
-
-X( 5) = (  3.16265926888329E-01,  7.85238422216786E-02)
-
-PATH NUMBER =      2509
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.34617396739256E-01, -9.60805564123564E-01)
-X( 2) = (  1.92990453012759E-01, -3.23925317983976E-01)
-X( 3) = ( -1.67079077579019E+00,  6.78852312273353E-01)
-X( 4) = (  6.19440515191365E-01,  7.92058586117187E-01)
-
-X( 5) = (  3.08068464675651E-01,  3.17027666675727E-02)
-
-PATH NUMBER =      2510
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.22167940859308E-01, -1.21716028503279E+00)
-X( 2) = (  5.53250054343639E-01, -5.07598999816177E-01)
-X( 3) = ( -1.99614147665147E+00,  5.76093173544442E-01)
-X( 4) = (  6.69866852898730E-01,  7.19698844216485E-01)
-
-X( 5) = (  3.19095933496802E-01, -1.35607155815886E-02)
-
-PATH NUMBER =      2511
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.35942254627776E-03, -1.27697951652834E+00)
-X( 2) = (  9.47288086930665E-01, -4.16730795124836E-01)
-X( 3) = ( -2.17932227195411E+00,  2.88243707025009E-01)
-X( 4) = (  7.55007614220184E-01,  6.96681491108093E-01)
-
-X( 5) = (  3.52831934158424E-01, -5.53743382584476E-02)
-
-PATH NUMBER =      2512
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.40188067348373E-01, -9.48774699489545E-01)
-X( 2) = (  9.90386721503922E-01, -1.26518300852028E-01)
-X( 3) = ( -1.85726736255124E+00, -7.61033024726654E-01)
-X( 4) = (  3.64091686824696E-01,  8.87466025097119E-01)
-
-X( 5) = (  3.74289355084509E-01, -3.28272133323622E-01)
-
-PATH NUMBER =      2513
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.55973040095858E-01, -6.36610713222715E-01)
-X( 2) = (  9.69322995311787E-01,  2.77312506773869E-01)
-X( 3) = ( -1.60559998751035E+00, -9.91415427447135E-01)
-X( 4) = (  4.01543892668306E-01,  9.67316385521861E-01)
-
-X( 5) = (  4.86604814568913E-01, -4.31414151432399E-01)
-
-PATH NUMBER =      2514
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.44014332503075E-01, -3.23054080331165E-01)
-X( 2) = (  6.93609805359288E-01,  5.73125350705804E-01)
-X( 3) = ( -1.26472463938740E+00, -1.00612991640494E+00)
-X( 4) = (  3.78907124527324E-01,  1.05255912427798E+00)
-
-X( 5) = (  7.35578824963239E-01, -3.81867990952518E-01)
-
-PATH NUMBER =      2515
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.56698668135121E-01, -1.54821434138655E-01)
-X( 2) = (  2.92256417435984E-01,  6.22506113674466E-01)
-X( 3) = ( -9.94140681976624E-01, -7.98291418683388E-01)
-X( 4) = (  3.06773377794569E-01,  1.10330821653399E+00)
-
-X( 5) = (  7.54641643937552E-01, -8.59917561032677E-02)
-
-PATH NUMBER =      2516
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.15357604923123E-02, -2.10630699496258E-01)
-X( 2) = ( -4.69394577027632E-02,  4.02348987880770E-01)
-X( 3) = ( -9.20457356156232E-01, -4.65149877233997E-01)
-X( 4) = (  2.18894834243593E-01,  1.09581759800994E+00)
-
-X( 5) = (  5.70939659983329E-01,  3.29058317945865E-03)
-
-PATH NUMBER =      2517
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.87104416305115E-01, -4.64368100892257E-01)
-X( 2) = ( -1.65264300337290E-01,  1.56679392574938E-02)
-X( 3) = ( -1.07815190897654E+00, -1.62585921756757E-01)
-X( 4) = (  1.56390841063121E-01,  1.03359221236221E+00)
-
-X( 5) = (  4.53722377780266E-01, -3.16352716998763E-02)
-
-PATH NUMBER =      2518
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.89140329469731E-01, -7.97307088236364E-01)
-X( 2) = ( -7.35260156475716E-03, -3.56604672063370E-01)
-X( 3) = ( -1.39343730659319E+00, -3.21725896432715E-02)
-X( 4) = (  1.48507711316802E-01,  9.45748009093494E-01)
-
-X( 5) = (  3.91066325770927E-01, -9.05299314545647E-02)
-
-PATH NUMBER =      2519
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.66908735897837E-02, -1.05366180914559E+00)
-X( 2) = (  3.52906999766123E-01, -5.40278353895571E-01)
-X( 3) = ( -1.71878800745446E+00, -1.34931728372182E-01)
-X( 4) = (  1.98934049024167E-01,  8.73388267192793E-01)
-
-X( 5) = (  3.58180330705017E-01, -1.56729478125669E-01)
-
-PATH NUMBER =      2520
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.50836489815802E-01, -1.11348104064114E+00)
-X( 2) = (  7.46945032353150E-01, -4.49410149204230E-01)
-X( 3) = ( -1.90196880275710E+00, -4.22781194891616E-01)
-X( 4) = (  2.84074810345621E-01,  8.50370914084400E-01)
-
-X( 5) = (  3.48515917574205E-01, -2.33358670224768E-01)
-
-PATH NUMBER =      2521
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.60026693736436E-01, -6.51518212093647E-01)
-X( 2) = (  1.12321503701984E+00, -1.43092234779974E-01)
-X( 3) = ( -1.64980167832881E+00, -8.71053525464207E-01)
-X( 4) = (  1.50512361934415E-01,  6.11663548575388E-01)
-
-X( 5) = (  5.78788143328714E-01, -4.93495762956338E-01)
-
-PATH NUMBER =      2522
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.75811666483922E-01, -3.39354225826818E-01)
-X( 2) = (  1.10215131082770E+00,  2.60738572845924E-01)
-X( 3) = ( -1.39813430328793E+00, -1.10143592818469E+00)
-X( 4) = (  1.87964567778025E-01,  6.91513909000130E-01)
-
-X( 5) = (  9.00368822063426E-01, -7.70753168547054E-01)
-
-PATH NUMBER =      2523
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.63852958891138E-01, -2.57975929352666E-02)
-X( 2) = (  8.26438120875204E-01,  5.56551416777858E-01)
-X( 3) = ( -1.05725895516498E+00, -1.11615041714249E+00)
-X( 4) = (  1.65327799637043E-01,  7.76756647756253E-01)
-
-X( 5) = (  1.74241925046472E+00, -2.62326235766122E-01)
-
-PATH NUMBER =      2524
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.76537294523184E-01,  1.42435053257243E-01)
-X( 2) = (  4.25084732951899E-01,  6.05932179746520E-01)
-X( 3) = ( -7.86674997754199E-01, -9.08311919420941E-01)
-X( 4) = (  9.31940529042876E-02,  8.27505740012254E-01)
-
-X( 5) = (  1.07685575160478E+00,  4.34771632169250E-01)
-
-PATH NUMBER =      2525
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.16971341042492E-02,  8.66257878996400E-02)
-X( 2) = (  8.58888578131526E-02,  3.85775053952824E-01)
-X( 3) = ( -7.12991671933807E-01, -5.75170377971550E-01)
-X( 4) = (  5.31550935331255E-03,  8.20015121488214E-01)
-
-X( 5) = (  7.00036368402113E-01,  2.71461616316703E-01)
-
-PATH NUMBER =      2526
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.67265789917052E-01, -1.67111613496359E-01)
-X( 2) = ( -3.24359848213745E-02, -9.05994670452001E-04)
-X( 3) = ( -8.70686224754115E-01, -2.72606422494309E-01)
-X( 4) = ( -5.71884838271595E-02,  7.57789735840483E-01)
-
-X( 5) = (  5.73423870430954E-01,  1.08480173279256E-01)
-
-PATH NUMBER =      2527
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.69301703081668E-01, -5.00050600840466E-01)
-X( 2) = (  1.25475713951159E-01, -3.73178605991315E-01)
-X( 3) = ( -1.18597162237076E+00, -1.42193090380824E-01)
-X( 4) = ( -6.50716135734787E-02,  6.69945532571764E-01)
-
-X( 5) = (  5.20390238243679E-01, -2.45376154788816E-02)
-
-PATH NUMBER =      2528
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.68522472017204E-02, -7.56405321749692E-01)
-X( 2) = (  4.85735315282039E-01, -5.56852287823517E-01)
-X( 3) = ( -1.51132232323204E+00, -2.44952229109734E-01)
-X( 4) = ( -1.46452758661140E-02,  5.97585790671062E-01)
-
-X( 5) = (  4.99779497000764E-01, -1.50976054479762E-01)
-
-PATH NUMBER =      2529
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.70675116203866E-01, -8.16224553245243E-01)
-X( 2) = (  8.79773347869065E-01, -4.65984083132175E-01)
-X( 3) = ( -1.69450311853468E+00, -5.32801695629168E-01)
-X( 4) = (  7.04954854553404E-02,  5.74568437562669E-01)
-
-X( 5) = (  5.08046527090898E-01, -2.95231324588265E-01)
-
-PATH NUMBER =      2530
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.84151176243099E-01, -4.11054508507505E-01)
-X( 2) = (  1.23562094938231E+00, -7.04082093369322E-02)
-X( 3) = ( -1.42015392910674E+00, -8.21977747430061E-01)
-X( 4) = (  1.64183521566144E-01,  2.63100450312775E-01)
-
-X( 5) = (  1.06090426857789E+00, -1.90854634168249E-01)
-
-PATH NUMBER =      2531
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.99936148990584E-01, -9.88905222406761E-02)
-X( 2) = (  1.21455722319017E+00,  3.33422598288965E-01)
-X( 3) = ( -1.16848655406585E+00, -1.05236015015054E+00)
-X( 4) = (  2.01635727409755E-01,  3.42950810737517E-01)
-
-X( 5) = (  1.69778267360952E+00,  4.29597809920754E-01)
-
-PATH NUMBER =      2532
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.87977441397801E-01,  2.14666110650874E-01)
-X( 2) = (  9.38844033237672E-01,  6.29235442220899E-01)
-X( 3) = ( -8.27611205942905E-01, -1.06707463910835E+00)
-X( 4) = (  1.78998959268772E-01,  4.28193549493640E-01)
-
-X( 5) = (  8.03560665576636E-01,  1.02483609210818E+00)
-
-PATH NUMBER =      2533
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00661777029847E-01,  3.82898756843385E-01)
-X( 2) = (  5.37490645314368E-01,  6.78616205189561E-01)
-X( 3) = ( -5.57027248532126E-01, -8.59236141386795E-01)
-X( 4) = (  1.06865212536017E-01,  4.78942641749641E-01)
-
-X( 5) = (  4.65357953856840E-01,  6.61728044556609E-01)
-
-PATH NUMBER =      2534
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.27572651597586E-01,  3.27089491485781E-01)
-X( 2) = (  1.98294770175621E-01,  4.58459079395865E-01)
-X( 3) = ( -4.83343922711735E-01, -5.26094599937404E-01)
-X( 4) = (  1.89866689850417E-02,  4.71452023225601E-01)
-
-X( 5) = (  4.27203943726619E-01,  4.33096089447422E-01)
-
-PATH NUMBER =      2535
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.43141307410389E-01,  7.33520900897820E-02)
-X( 2) = (  7.99699275410941E-02,  7.17780307725889E-02)
-X( 3) = ( -6.41038475532042E-01, -2.23530644460163E-01)
-X( 4) = ( -4.35173241954305E-02,  4.09226637577870E-01)
-
-X( 5) = (  4.48055855561901E-01,  2.82731975968076E-01)
-
-PATH NUMBER =      2536
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.45177220575006E-01, -2.59586897254325E-01)
-X( 2) = (  2.37881626313627E-01, -3.00494580548274E-01)
-X( 3) = ( -9.56323873148691E-01, -9.31173123466783E-02)
-X( 4) = ( -5.14004539417497E-02,  3.21382434309151E-01)
-
-X( 5) = (  4.93676667109868E-01,  1.61417705773731E-01)
-
-PATH NUMBER =      2537
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.32727764695057E-01, -5.15941618163550E-01)
-X( 2) = (  5.98141227644508E-01, -4.84168262380476E-01)
-X( 3) = ( -1.28167457400997E+00, -1.95876451075589E-01)
-X( 4) = ( -9.74116234384926E-04,  2.49022692408449E-01)
-
-X( 5) = (  5.69288199173338E-01,  4.39689737532106E-02)
-
-PATH NUMBER =      2538
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.47995987105286E-02, -5.75760849659102E-01)
-X( 2) = (  9.92179260231534E-01, -3.93300057689134E-01)
-X( 3) = ( -1.46485536931261E+00, -4.83725917595023E-01)
-X( 4) = (  8.41666450870697E-02,  2.26005339300056E-01)
-
-X( 5) = (  7.12239138473905E-01, -8.55848696900712E-02)
-
-PATH NUMBER =      2539
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.48556241421451E-02, -3.39899228095458E-01)
-X( 2) = (  1.27500848294437E+00,  5.75241121793329E-02)
-X( 3) = ( -1.27577884899646E+00, -6.36768792582913E-01)
-X( 4) = (  3.98708278190182E-01,  4.87327783368834E-03)
-
-X( 5) = (  7.01563366322203E-01,  2.28375637905909E-01)
-
-PATH NUMBER =      2540
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.10640596889631E-01, -2.77352418286286E-02)
-X( 2) = (  1.25394475675223E+00,  4.61354919805231E-01)
-X( 3) = ( -1.02411147395558E+00, -8.67151195303394E-01)
-X( 4) = (  4.36160484033792E-01,  8.47236382584302E-02)
-
-X( 5) = (  6.69720939969457E-01,  5.21650197537195E-01)
-
-PATH NUMBER =      2541
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.86818892968472E-02,  2.85821391062922E-01)
-X( 2) = (  9.78231566799733E-01,  7.57167763737165E-01)
-X( 3) = ( -6.83236125832632E-01, -8.81865684261201E-01)
-X( 4) = (  4.13523715892810E-01,  1.69966377014554E-01)
-
-X( 5) = (  3.98249640846778E-01,  5.56921966889794E-01)
-
-PATH NUMBER =      2542
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.88633775071107E-01,  4.54054037255432E-01)
-X( 2) = (  5.76878178876428E-01,  8.06548526705827E-01)
-X( 3) = ( -4.12652168421852E-01, -6.74027186539648E-01)
-X( 4) = (  3.41389969160054E-01,  2.20715469270554E-01)
-
-X( 5) = (  2.91768667653362E-01,  4.28164049022947E-01)
-
-PATH NUMBER =      2543
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.16868203698540E-01,  3.98244771897829E-01)
-X( 2) = (  2.37682303737681E-01,  5.86391400912130E-01)
-X( 3) = ( -3.38968842601461E-01, -3.40885645090257E-01)
-X( 4) = (  2.53511425609079E-01,  2.13224850746514E-01)
-
-X( 5) = (  2.82410188945164E-01,  3.23742025831271E-01)
-
-PATH NUMBER =      2544
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.32436859511342E-01,  1.44507370501829E-01)
-X( 2) = (  1.19357461103154E-01,  1.99710352288854E-01)
-X( 3) = ( -4.96663395421768E-01, -3.83216896130157E-02)
-X( 4) = (  1.91007432428607E-01,  1.50999465098783E-01)
-
-X( 5) = (  3.07151000353235E-01,  2.47814060229948E-01)
-
-PATH NUMBER =      2545
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.34472772675959E-01, -1.88431616842277E-01)
-X( 2) = (  2.77269159875687E-01, -1.72562259032009E-01)
-X( 3) = ( -8.11948793038417E-01,  9.20916425004695E-02)
-X( 4) = (  1.83124302682288E-01,  6.31552618300642E-02)
-
-X( 5) = (  3.52198947222510E-01,  1.88756546445606E-01)
-
-PATH NUMBER =      2546
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.22023316796011E-01, -4.44786337751503E-01)
-X( 2) = (  6.37528761206567E-01, -3.56235940864210E-01)
-X( 3) = ( -1.13729949389969E+00, -1.06674962284414E-02)
-X( 4) = (  2.33550640389653E-01, -9.20448007063727E-03)
-
-X( 5) = (  4.22773192440021E-01,  1.43185346424810E-01)
-
-PATH NUMBER =      2547
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.94495953390425E-01, -5.04605569247054E-01)
-X( 2) = (  1.03156679379359E+00, -2.65367736172868E-01)
-X( 3) = ( -1.32048028920233E+00, -2.98516962747875E-01)
-X( 4) = (  3.18691401711107E-01, -3.22218331790301E-02)
-
-X( 5) = (  5.37965867654237E-01,  1.27623103319777E-01)
-
-PATH NUMBER =      2548
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.72495358576463E-01, -4.71346717365156E-01)
-X( 2) = (  1.22294777300865E+00,  1.80843774721984E-01)
-X( 3) = ( -1.28423114253187E+00, -4.02087989263997E-01)
-X( 4) = (  7.44349891729802E-01, -4.21906049835595E-02)
-
-X( 5) = (  4.64642756338823E-01,  1.48826657917281E-01)
-
-PATH NUMBER =      2549
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.67103858289773E-02, -1.59182731098327E-01)
-X( 2) = (  1.20188404681652E+00,  5.84674582347881E-01)
-X( 3) = ( -1.03256376749099E+00, -6.32470391984477E-01)
-X( 4) = (  7.81802097573413E-01,  3.76597554411822E-02)
-
-X( 5) = (  4.68376497582685E-01,  2.73397750941442E-01)
-
-PATH NUMBER =      2550
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.68669093421761E-01,  1.54373901793224E-01)
-X( 2) = (  9.26170856864020E-01,  8.80487426279815E-01)
-X( 3) = ( -6.91688419368039E-01, -6.47184880942284E-01)
-X( 4) = (  7.59165329432430E-01,  1.22902494197306E-01)
-
-X( 5) = (  3.57548923617527E-01,  3.29431712289260E-01)
-
-PATH NUMBER =      2551
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.55984757789715E-01,  3.22606547985735E-01)
-X( 2) = (  5.24817468940716E-01,  9.29868189248477E-01)
-X( 3) = ( -4.21104461957260E-01, -4.39346383220731E-01)
-X( 4) = (  6.87031582699675E-01,  1.73651586453306E-01)
-
-X( 5) = (  2.77572468218219E-01,  2.85603534246139E-01)
-
-PATH NUMBER =      2552
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.84219186417148E-01,  2.66797282628131E-01)
-X( 2) = (  1.85621593801969E-01,  7.09711063454781E-01)
-X( 3) = ( -3.47421136136868E-01, -1.06204841771340E-01)
-X( 4) = (  5.99153039148700E-01,  1.66160967929266E-01)
-
-X( 5) = (  2.53525653422955E-01,  2.26534262344852E-01)
-
-PATH NUMBER =      2553
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.99787842229950E-01,  1.30598812321317E-02)
-X( 2) = (  6.72967511674421E-02,  3.23030014831505E-01)
-X( 3) = ( -5.05115688957176E-01,  1.96359113705901E-01)
-X( 4) = (  5.36649045968228E-01,  1.03935582281535E-01)
-
-X( 5) = (  2.59052255783670E-01,  1.76630791725602E-01)
-
-PATH NUMBER =      2554
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.00182375539457E+00, -3.19879106111975E-01)
-X( 2) = (  2.25208449939975E-01, -4.92425964893583E-02)
-X( 3) = ( -8.20401086573824E-01,  3.26772445819386E-01)
-X( 4) = (  5.28765916221908E-01,  1.60913790128164E-02)
-
-X( 5) = (  2.82468262189833E-01,  1.36643992406636E-01)
-
-PATH NUMBER =      2555
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.89374299514619E-01, -5.76233827021200E-01)
-X( 2) = (  5.85468051270855E-01, -2.32916278321559E-01)
-X( 3) = ( -1.14575178743510E+00,  2.24013307090476E-01)
-X( 4) = (  5.79192253929273E-01, -5.62683628878854E-02)
-
-X( 5) = (  3.23433060927683E-01,  1.07344089625317E-01)
-
-PATH NUMBER =      2556
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.61846936109033E-01, -6.36053058516752E-01)
-X( 2) = (  9.79506083857882E-01, -1.42048073630218E-01)
-X( 3) = ( -1.32893258273774E+00, -6.38361594289582E-02)
-X( 4) = (  6.64333015250728E-01, -7.92857159962780E-02)
-
-X( 5) = (  3.87116877084725E-01,  9.95629408165276E-02)
-
-PATH NUMBER =      2557
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.92805275823484E-01, -7.43891235211190E-01)
-X( 2) = (  1.10379860434443E+00,  2.41848137641928E-01)
-X( 3) = ( -1.44155588763096E+00, -2.27745093532836E-01)
-X( 4) = (  1.03937880983117E+00,  1.43930515688016E-01)
-
-X( 5) = (  3.78623120882763E-01,  5.20760226103003E-02)
-
-PATH NUMBER =      2558
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.77020303075999E-01, -4.31727248944362E-01)
-X( 2) = (  1.08273487815230E+00,  6.45678945267825E-01)
-X( 3) = ( -1.18988851259008E+00, -4.58127496253317E-01)
-X( 4) = (  1.07683101567478E+00,  2.23780876112758E-01)
-
-X( 5) = (  4.11821421541433E-01,  1.21896674686160E-01)
-
-PATH NUMBER =      2559
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.88979010668782E-01, -1.18170616052811E-01)
-X( 2) = (  8.07021688199798E-01,  9.41491789199760E-01)
-X( 3) = ( -8.49013164467132E-01, -4.72841985211124E-01)
-X( 4) = (  1.05419424753380E+00,  3.09023614868882E-01)
-
-X( 5) = (  3.64858242413365E-01,  1.90667052751273E-01)
-
-PATH NUMBER =      2560
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.76294675036736E-01,  5.00620301396994E-02)
-X( 2) = (  4.05668300276494E-01,  9.90872552168421E-01)
-X( 3) = ( -5.78429207056352E-01, -2.65003487489571E-01)
-X( 4) = (  9.82060500801045E-01,  3.59772707124882E-01)
-
-X( 5) = (  2.96561066095082E-01,  1.90073934383696E-01)
-
-PATH NUMBER =      2561
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.04529103664169E-01, -5.74723521790360E-03)
-X( 2) = (  6.64724251377469E-02,  7.70715426374726E-01)
-X( 3) = ( -5.04745881235961E-01,  6.81380539598205E-02)
-X( 4) = (  8.94181957250070E-01,  3.52282088600842E-01)
-
-X( 5) = (  2.60233019936749E-01,  1.55313478749929E-01)
-
-PATH NUMBER =      2562
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12009775947697E+00, -2.59484636613903E-01)
-X( 2) = ( -5.18524174967801E-02,  3.84034377751449E-01)
-X( 3) = ( -6.62440434056269E-01,  3.70702009437061E-01)
-X( 4) = (  8.31677964069597E-01,  2.90056702953112E-01)
-
-X( 5) = (  2.50739095066808E-01,  1.16977802627541E-01)
-
-PATH NUMBER =      2563
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12213367264159E+00, -5.92423623958010E-01)
-X( 2) = (  1.06059281275753E-01,  1.17617664305861E-02)
-X( 3) = ( -9.77725831672917E-01,  5.01115341550546E-01)
-X( 4) = (  8.23794834323278E-01,  2.02212499684392E-01)
-
-X( 5) = (  2.58667856106416E-01,  8.24957174929921E-02)
-
-PATH NUMBER =      2564
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.09684216761640E-01, -8.48778344867235E-01)
-X( 2) = (  4.66318882606633E-01, -1.71911915401615E-01)
-X( 3) = ( -1.30307653253419E+00,  3.98356202821635E-01)
-X( 4) = (  8.74221172030643E-01,  1.29852757783691E-01)
-
-X( 5) = (  2.81632053242259E-01,  5.39085314206515E-02)
-
-PATH NUMBER =      2565
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.82156853356055E-01, -9.08597576362787E-01)
-X( 2) = (  8.60356915193659E-01, -8.10437107102737E-02)
-X( 3) = ( -1.48625732783683E+00,  1.10506736302202E-01)
-X( 4) = (  9.59361933352097E-01,  1.06835404675298E-01)
-
-X( 5) = (  3.22151756703412E-01,  3.72796101039299E-02)
-
-PATH NUMBER =      2566
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.09779780223246E-01, -1.03000617273849E+00)
-X( 2) = (  9.73312197165197E-01,  2.11992581540951E-01)
-X( 3) = ( -1.67413908759210E+00, -1.95317083907500E-01)
-X( 4) = (  1.14574772283347E+00,  4.76148498980339E-01)
-
-X( 5) = (  3.40926489935512E-01, -3.05574017002770E-02)
-
-PATH NUMBER =      2567
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.39948074757605E-02, -7.17842186471656E-01)
-X( 2) = (  9.52248470973063E-01,  6.15823389166849E-01)
-X( 3) = ( -1.42247171255121E+00, -4.25699486627980E-01)
-X( 4) = (  1.18319992867708E+00,  5.55998859405081E-01)
-
-X( 5) = (  3.91992712152461E-01,  6.68875134937394E-03)
-
-PATH NUMBER =      2568
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.05953515068544E-01, -4.04285553580105E-01)
-X( 2) = (  6.76535281020564E-01,  9.11636233098783E-01)
-X( 3) = ( -1.08159636442826E+00, -4.40413975585787E-01)
-X( 4) = (  1.16056316053610E+00,  6.41241598161204E-01)
-
-X( 5) = (  3.88364544654600E-01,  7.98110746329072E-02)
-
-PATH NUMBER =      2569
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.93269179436498E-01, -2.36052907387595E-01)
-X( 2) = (  2.75181893097259E-01,  9.61016996067445E-01)
-X( 3) = ( -8.11012407017484E-01, -2.32575477864234E-01)
-X( 4) = (  1.08842941380334E+00,  6.91990690417205E-01)
-
-X( 5) = (  3.31483404726663E-01,  1.11959427442099E-01)
-
-PATH NUMBER =      2570
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.21503608063931E-01, -2.91862172745198E-01)
-X( 2) = ( -6.40139820414877E-02,  7.40859870273749E-01)
-X( 3) = ( -7.37329081197093E-01,  1.00566063585157E-01)
-X( 4) = (  1.00055087025237E+00,  6.84500071893165E-01)
-
-X( 5) = (  2.84332659222591E-01,  9.68854215829056E-02)
-
-PATH NUMBER =      2571
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.03707226387673E+00, -5.45599574141198E-01)
-X( 2) = ( -1.82338824676015E-01,  3.54178821650473E-01)
-X( 3) = ( -8.95023634017401E-01,  4.03130019062398E-01)
-X( 4) = (  9.38046877071894E-01,  6.22274686245434E-01)
-
-X( 5) = (  2.61515855055763E-01,  6.62859667304722E-02)
-
-PATH NUMBER =      2572
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.03910817704135E+00, -8.78538561485304E-01)
-X( 2) = ( -2.44271259034817E-02, -1.80937896703904E-02)
-X( 3) = ( -1.21030903163405E+00,  5.33543351175883E-01)
-X( 4) = (  9.30163747325575E-01,  5.34430482976715E-01)
-
-X( 5) = (  2.56901713134710E-01,  3.36871743021793E-02)
-
-PATH NUMBER =      2573
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.26658721161402E-01, -1.13489328239453E+00)
-X( 2) = (  3.35832475427399E-01, -2.01767471502591E-01)
-X( 3) = ( -1.53565973249532E+00,  4.30784212446972E-01)
-X( 4) = (  9.80590085032940E-01,  4.62070741076014E-01)
-
-X( 5) = (  2.67142555974048E-01,  2.73444187442176E-03)
-
-PATH NUMBER =      2574
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.99131357755816E-01, -1.19471251389008E+00)
-X( 2) = (  7.29870508014425E-01, -1.10899266811250E-01)
-X( 3) = ( -1.71884052779796E+00,  1.42934745927538E-01)
-X( 4) = (  1.06573084635439E+00,  4.39053387967621E-01)
-
-X( 5) = (  2.94010349207231E-01, -2.28597976884532E-02)
-
-PATH NUMBER =      2575
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.77325761072991E-02, -1.19581517086469E+00)
-X( 2) = (  8.92544591584993E-01,  1.05246852926246E-01)
-X( 3) = ( -1.87315247827911E+00, -3.19977386488864E-01)
-X( 4) = (  1.01368543418413E+00,  7.99014858319318E-01)
-
-X( 5) = (  3.25148949758290E-01, -1.10639606792784E-01)
-
-PATH NUMBER =      2576
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.53517548854784E-01, -8.83651184597856E-01)
-X( 2) = (  8.71480865392859E-01,  5.09077660552143E-01)
-X( 3) = ( -1.62148510323823E+00, -5.50359789209344E-01)
-X( 4) = (  1.05113764002774E+00,  8.78865218744059E-01)
-
-X( 5) = (  3.89959761614700E-01, -1.03082198023464E-01)
-
-PATH NUMBER =      2577
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.15588412620009E-02, -5.70094551706305E-01)
-X( 2) = (  5.95767675440360E-01,  8.04890504484078E-01)
-X( 3) = ( -1.28060975511528E+00, -5.65074278167151E-01)
-X( 4) = (  1.02850087188676E+00,  9.64107957500183E-01)
-
-X( 5) = (  4.29276001774230E-01, -3.13828638363144E-02)
-
-PATH NUMBER =      2578
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.45756823105953E-01, -4.01861905513795E-01)
-X( 2) = (  1.94414287517056E-01,  8.54271267452740E-01)
-X( 3) = ( -1.01002579770450E+00, -3.57235780445598E-01)
-X( 4) = (  9.56367125154002E-01,  1.01485704975618E+00)
-
-X( 5) = (  3.88127339819400E-01,  3.60822724482460E-02)
-
-PATH NUMBER =      2579
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.73991251733386E-01, -4.57671170871398E-01)
-X( 2) = ( -1.44781587621691E-01,  6.34114141659044E-01)
-X( 3) = ( -9.36342471884110E-01, -2.40942389962069E-02)
-X( 4) = (  8.68488581603026E-01,  1.00736643123214E+00)
-
-X( 5) = (  3.27850588529455E-01,  4.33782724771927E-02)
-
-PATH NUMBER =      2580
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.89559907546188E-01, -7.11408572267397E-01)
-X( 2) = ( -2.63106430256218E-01,  2.47433093035768E-01)
-X( 3) = ( -1.09403702470442E+00,  2.78469716481034E-01)
-X( 4) = (  8.05984588422554E-01,  9.45141045584413E-01)
-
-X( 5) = (  2.89398298048826E-01,  1.96550918178915E-02)
-
-PATH NUMBER =      2581
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.91595820710805E-01, -1.04434755961150E+00)
-X( 2) = ( -1.05194731483685E-01, -1.24839518285095E-01)
-X( 3) = ( -1.40932242232107E+00,  4.08883048594519E-01)
-X( 4) = (  7.98101458676234E-01,  8.57296842315693E-01)
-
-X( 5) = (  2.71616296699545E-01, -1.29634426660640E-02)
-
-PATH NUMBER =      2582
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.79146364830858E-01, -1.30070228052073E+00)
-X( 2) = (  2.55064869847195E-01, -3.08513200117297E-01)
-X( 3) = ( -1.73467312318234E+00,  3.06123909865609E-01)
-X( 4) = (  8.48527796383600E-01,  7.84937100414992E-01)
-
-X( 5) = (  2.70039056381148E-01, -4.80571915478613E-02)
-
-PATH NUMBER =      2583
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.51619001425272E-01, -1.36052151201628E+00)
-X( 2) = (  6.49102902434221E-01, -2.17644995425955E-01)
-X( 3) = ( -1.91785391848498E+00,  1.82744433461746E-02)
-X( 4) = (  9.33668557705054E-01,  7.61919747306600E-01)
-
-X( 5) = (  2.85622145826777E-01, -8.31879114347167E-02)
-
-PATH NUMBER =      2584
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.33918010847656E-01, -1.16373435660479E+00)
-X( 2) = (  8.99287847886747E-01, -2.84415354367392E-02)
-X( 3) = ( -1.94547548240209E+00, -5.43396060254169E-01)
-X( 4) = (  7.04985356451031E-01,  9.61456835910354E-01)
-
-X( 5) = (  3.28897981757564E-01, -2.02687326054323E-01)
-
-PATH NUMBER =      2585
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.49702983595142E-01, -8.51570370337963E-01)
-X( 2) = (  8.78224121694613E-01,  3.75389272189159E-01)
-X( 3) = ( -1.69380810736121E+00, -7.73778462974650E-01)
-X( 4) = (  7.42437562294641E-01,  1.04130719633510E+00)
-
-X( 5) = (  4.08809467055739E-01, -2.33580513427696E-01)
-
-PATH NUMBER =      2586
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.37744276002359E-01, -5.38013737446412E-01)
-X( 2) = (  6.02510931742114E-01,  6.71202116121093E-01)
-X( 3) = ( -1.35293275923826E+00, -7.88492951932457E-01)
-X( 4) = (  7.19800794153658E-01,  1.12654993509122E+00)
-
-X( 5) = (  5.09872176670674E-01, -1.70347522412074E-01)
-
-PATH NUMBER =      2587
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.04286116344051E-02, -3.69781091253902E-01)
-X( 2) = (  2.01157543818809E-01,  7.20582879089755E-01)
-X( 3) = ( -1.08234880182748E+00, -5.80654454210904E-01)
-X( 4) = (  6.47667047420903E-01,  1.17729902734722E+00)
-
-X( 5) = (  4.95473207788531E-01, -4.51992756589011E-02)
-
-PATH NUMBER =      2588
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.77805816993028E-01, -4.25590356611505E-01)
-X( 2) = ( -1.38038331319938E-01,  5.00425753296059E-01)
-X( 3) = ( -1.00866547600709E+00, -2.47512912761513E-01)
-X( 4) = (  5.59788503869928E-01,  1.16980840882318E+00)
-
-X( 5) = (  4.08975531357571E-01, -3.92063429552109E-03)
-
-PATH NUMBER =      2589
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.93374472805831E-01, -6.79327758007504E-01)
-X( 2) = ( -2.56363173954465E-01,  1.13744704672783E-01)
-X( 3) = ( -1.16636002882740E+00,  5.50510427157281E-02)
-X( 4) = (  4.97284510689456E-01,  1.10758302317545E+00)
-
-X( 5) = (  3.44965484601000E-01, -2.22814961698375E-02)
-
-PATH NUMBER =      2590
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.95410385970447E-01, -1.01226674535161E+00)
-X( 2) = ( -9.84514751819317E-02, -2.58527906648080E-01)
-X( 3) = ( -1.48164542644405E+00,  1.85464374829213E-01)
-X( 4) = (  4.89401380943136E-01,  1.01973881990673E+00)
-
-X( 5) = (  3.09203978594237E-01, -5.89948659573675E-02)
-
-PATH NUMBER =      2591
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.82960930090500E-01, -1.26862146626084E+00)
-X( 2) = (  2.61808126148949E-01, -4.42201588480282E-01)
-X( 3) = ( -1.80699612730532E+00,  8.27052361003031E-02)
-X( 4) = (  5.39827718650501E-01,  9.47379078006029E-01)
-
-X( 5) = (  2.93606684059952E-01, -1.02377392468348E-01)
-
-PATH NUMBER =      2592
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.45664333150865E-02, -1.32844069775639E+00)
-X( 2) = (  6.55846158735975E-01, -3.51333383788940E-01)
-X( 3) = ( -1.99017692260796E+00, -2.05144230419131E-01)
-X( 4) = (  6.24968479971956E-01,  9.24361724897636E-01)
-
-X( 5) = (  2.97073814152695E-01, -1.51063917143369E-01)
-
-PATH NUMBER =      2593
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.03300989752347E-01, -9.62994470670592E-01)
-X( 2) = (  7.25092606206211E-01, -2.63756237690499E-01)
-X( 3) = ( -1.39522996578493E+00, -1.01740982551814E+00)
-X( 4) = (  1.18125897395384E-01,  9.78291658730503E-01)
-
-X( 5) = (  1.83099734702379E-01, -4.28018575407180E-01)
-
-PATH NUMBER =      2594
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.19085962499832E-01, -6.50830484403763E-01)
-X( 2) = (  7.04028880014077E-01,  1.40074569935398E-01)
-X( 3) = ( -1.14356259074405E+00, -1.24779222823862E+00)
-X( 4) = (  1.55578103238995E-01,  1.05814201915524E+00)
-
-X( 5) = (  1.60370679982110E-01, -5.51991011364952E-01)
-
-PATH NUMBER =      2595
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.07127254907049E-01, -3.37273851512212E-01)
-X( 2) = (  4.28315690061578E-01,  4.35887413867332E-01)
-X( 3) = ( -8.02687242621099E-01, -1.26250671719642E+00)
-X( 4) = (  1.32941335098012E-01,  1.14338475791137E+00)
-
-X( 5) = (  2.50379755005231E-01, -7.44724616232666E-01)
-
-PATH NUMBER =      2596
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.19811590539095E-01, -1.69041205319702E-01)
-X( 2) = (  2.69623021382731E-02,  4.85268176835995E-01)
-X( 3) = ( -5.32103285210320E-01, -1.05466821947487E+00)
-X( 4) = (  6.08075883652572E-02,  1.19413385016737E+00)
-
-X( 5) = (  6.10771559150976E-01, -7.59614469404773E-01)
-
-PATH NUMBER =      2597
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.42283808833859E-03, -2.24850470677305E-01)
-X( 2) = ( -3.12233573000474E-01,  2.65111051042298E-01)
-X( 3) = ( -4.58419959389928E-01, -7.21526678025480E-01)
-X( 4) = ( -2.70709551857181E-02,  1.18664323164333E+00)
-
-X( 5) = (  6.83183543003126E-01, -4.02792998665300E-01)
-
-PATH NUMBER =      2598
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.23991493901141E-01, -4.78587872073305E-01)
-X( 2) = ( -4.30558415635001E-01, -1.21569997580978E-01)
-X( 3) = ( -6.16114512210235E-01, -4.18962722548239E-01)
-X( 4) = ( -8.95749483661902E-02,  1.12441784599560E+00)
-
-X( 5) = (  5.12696593667021E-01, -2.69561028808685E-01)
-
-PATH NUMBER =      2599
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.26027407065757E-01, -8.11526859417412E-01)
-X( 2) = ( -2.72646716862468E-01, -4.93842608901841E-01)
-X( 3) = ( -9.31399909826884E-01, -2.88549390434754E-01)
-X( 4) = ( -9.74580781125094E-02,  1.03657364272688E+00)
-
-X( 5) = (  3.85204951295650E-01, -2.65070959470472E-01)
-
-PATH NUMBER =      2600
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.35779511858093E-02, -1.06788158032664E+00)
-X( 2) = (  8.76128844684130E-02, -6.77516290734043E-01)
-X( 3) = ( -1.25675061068816E+00, -3.91308529163665E-01)
-X( 4) = ( -4.70317404051450E-02,  9.64213900826177E-01)
-
-X( 5) = (  2.98361996313363E-01, -2.97979419212196E-01)
-
-PATH NUMBER =      2601
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.13949412219776E-01, -1.12770081182219E+00)
-X( 2) = (  4.81650917055439E-01, -5.86648086042701E-01)
-X( 3) = ( -1.43993140599080E+00, -6.79157995683098E-01)
-X( 4) = (  3.81090209163098E-02,  9.41196547717784E-01)
-
-X( 5) = (  2.33308144421349E-01, -3.50534469082330E-01)
-
-PATH NUMBER =      2602
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.23139616140410E-01, -6.65737983274694E-01)
-X( 2) = (  8.57920921722126E-01, -2.80330171618445E-01)
-X( 3) = ( -1.18776428156251E+00, -1.12743032625569E+00)
-X( 4) = ( -9.54534274948966E-02,  7.02489182208771E-01)
-
-X( 5) = (  1.41254098139152E-01, -6.33627596244789E-01)
-
-PATH NUMBER =      2603
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.38924588887895E-01, -3.53573997007865E-01)
-X( 2) = (  8.36857195529992E-01,  1.23500636007452E-01)
-X( 3) = ( -9.36096906521622E-01, -1.35781272897617E+00)
-X( 4) = ( -5.80012216512861E-02,  7.82339542633513E-01)
-
-X( 5) = ( -1.68978857405275E-02, -8.33567908928693E-01)
-
-PATH NUMBER =      2604
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.26965881295112E-01, -4.00173641163141E-02)
-X( 2) = (  5.61144005577493E-01,  4.19313479939387E-01)
-X( 3) = ( -5.95221558398673E-01, -1.37252721793398E+00)
-X( 4) = ( -8.06379897922688E-02,  8.67582281389637E-01)
-
-X( 5) = ( -1.88873573007129E-01, -1.33385039161257E+00)
-
-PATH NUMBER =      2605
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.39650216927158E-01,  1.28215282076196E-01)
-X( 2) = (  1.59790617654189E-01,  4.68694242908049E-01)
-X( 3) = ( -3.24637600987894E-01, -1.16468872021242E+00)
-X( 4) = ( -1.52771736525024E-01,  9.18331373645637E-01)
-
-X( 5) = (  1.06226665023750E+00, -2.61652916628093E+00)
-
-PATH NUMBER =      2606
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14157882997243E-02,  7.24060167185927E-02)
-X( 2) = ( -1.79405257484558E-01,  2.48537117114352E-01)
-X( 3) = ( -2.50954275167503E-01, -8.31547178763032E-01)
-X( 4) = ( -2.40650280075999E-01,  9.10840755121597E-01)
-
-X( 5) = (  1.59741493889619E+00, -4.68136273475797E-01)
-
-PATH NUMBER =      2607
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.04152867513078E-01, -1.81331384677407E-01)
-X( 2) = ( -2.97730100119085E-01, -1.38143931508924E-01)
-X( 3) = ( -4.08648827987810E-01, -5.28983223285791E-01)
-X( 4) = ( -3.03154273256471E-01,  8.48615369473866E-01)
-
-X( 5) = (  8.87625129801085E-01, -2.89344457987832E-01)
-
-PATH NUMBER =      2608
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.06188780677695E-01, -5.14270372021514E-01)
-X( 2) = ( -1.39818401346552E-01, -5.10416542829787E-01)
-X( 3) = ( -7.23934225604459E-01, -3.98569891172306E-01)
-X( 4) = ( -3.11037403002790E-01,  7.60771166205147E-01)
-
-X( 5) = (  5.91539868618851E-01, -3.50024153626946E-01)
-
-PATH NUMBER =      2609
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.26067520225339E-03, -7.70625092930740E-01)
-X( 2) = (  2.20441199984329E-01, -6.94090224661988E-01)
-X( 3) = ( -1.04928492646573E+00, -5.01329029901217E-01)
-X( 4) = ( -2.60611065295425E-01,  6.88411424304446E-01)
-
-X( 5) = (  4.14961223367065E-01, -4.27776924829485E-01)
-
-PATH NUMBER =      2610
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.33788038607839E-01, -8.30444324426291E-01)
-X( 2) = (  6.14479232571355E-01, -6.03222019970647E-01)
-X( 3) = ( -1.23246572176837E+00, -7.89178496420651E-01)
-X( 4) = ( -1.75470303973971E-01,  6.65394071196053E-01)
-
-X( 5) = (  2.76407996156891E-01, -5.16202500321515E-01)
-
-PATH NUMBER =      2611
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.47264098647073E-01, -4.25274279688553E-01)
-X( 2) = (  9.70326834084595E-01, -2.07646146175405E-01)
-X( 3) = ( -9.58116532340433E-01, -1.07835454822154E+00)
-X( 4) = ( -8.17822678631674E-02,  3.53926083946159E-01)
-
-X( 5) = (  3.41670308115994E-01, -1.12348073668560E+00)
-
-PATH NUMBER =      2612
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.63049071394558E-01, -1.13110293421724E-01)
-X( 2) = (  9.49263107892460E-01,  1.96184661450493E-01)
-X( 3) = ( -7.06449157299549E-01, -1.30873695094202E+00)
-X( 4) = ( -4.43300620195571E-02,  4.33776444370900E-01)
-
-X( 5) = ( -4.09179650265358E-01, -1.86964695901137E+00)
-
-PATH NUMBER =      2613
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.51090363801775E-01,  2.00446339469827E-01)
-X( 2) = (  6.73549917939961E-01,  4.91997505382427E-01)
-X( 3) = ( -3.65573809176601E-01, -1.32345143989983E+00)
-X( 4) = ( -6.69668301605397E-02,  5.19019183127024E-01)
-
-X( 5) = ( -4.93523829515972E+00, -1.19125127762744E+00)
-
-PATH NUMBER =      2614
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.63774699433821E-01,  3.68678985662337E-01)
-X( 2) = (  2.72196530016657E-01,  5.41378268351089E-01)
-X( 3) = ( -9.49898517658214E-02, -1.11561294217828E+00)
-X( 4) = ( -1.39100576893295E-01,  5.69768275383025E-01)
-
-X( 5) = (  3.46599795340498E-01,  2.72874678443482E+00)
-
-PATH NUMBER =      2615
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.64459729193612E-01,  3.12869720304734E-01)
-X( 2) = ( -6.69993451220899E-02,  3.21221142557393E-01)
-X( 3) = ( -2.13065259454300E-02, -7.82471400728886E-01)
-X( 4) = ( -2.26979120444270E-01,  5.62277656858984E-01)
-
-X( 5) = (  9.60112961414193E-01,  1.02038750751617E+00)
-
-PATH NUMBER =      2616
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.80028385006415E-01,  5.91323189087346E-02)
-X( 2) = ( -1.85324187756617E-01, -6.54599060658828E-02)
-X( 3) = ( -1.79001078765738E-01, -4.79907445251645E-01)
-X( 4) = ( -2.89483113624742E-01,  5.00052271211254E-01)
-
-X( 5) = (  9.36572193983153E-01,  3.58925550310526E-01)
-
-PATH NUMBER =      2617
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.82064298171031E-01, -2.73806668435372E-01)
-X( 2) = ( -2.74124889840837E-02, -4.37732517386746E-01)
-X( 3) = ( -4.94286476382386E-01, -3.49494113138160E-01)
-X( 4) = ( -2.97366243371061E-01,  4.12208067942535E-01)
-
-X( 5) = (  8.56867173697880E-01, -3.83555065292436E-02)
-
-PATH NUMBER =      2618
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.69614842291083E-01, -5.30161389344598E-01)
-X( 2) = (  3.32847112346797E-01, -6.21406199218947E-01)
-X( 3) = ( -8.19637177243662E-01, -4.52253251867071E-01)
-X( 4) = ( -2.46939905663696E-01,  3.39848326041833E-01)
-
-X( 5) = (  7.53658510497622E-01, -3.59516485715460E-01)
-
-PATH NUMBER =      2619
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.57912521114502E-01, -5.89980620840149E-01)
-X( 2) = (  7.26885144933823E-01, -5.30537994527606E-01)
-X( 3) = ( -1.00281797254630E+00, -7.40102718386505E-01)
-X( 4) = ( -1.61799144342242E-01,  3.16830972933440E-01)
-
-X( 5) = (  6.07181248963926E-01, -6.89985137964887E-01)
-
-PATH NUMBER =      2620
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.57968546546119E-01, -3.54118999276505E-01)
-X( 2) = (  1.00971436764665E+00, -7.97138246591387E-02)
-X( 3) = ( -8.13741452230159E-01, -8.93145593374395E-01)
-X( 4) = (  1.52742488760870E-01,  9.56989114670721E-02)
-
-X( 5) = (  1.41027045571193E+00, -5.22317037177210E-01)
-
-PATH NUMBER =      2621
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.73753519293605E-01, -4.19550130096760E-02)
-X( 2) = (  9.88650641454520E-01,  3.24116982966759E-01)
-X( 3) = ( -5.62074077189275E-01, -1.12352799609488E+00)
-X( 4) = (  1.90194694604481E-01,  1.75549271891814E-01)
-
-X( 5) = (  3.51542183807197E+00,  9.76907232519749E-01)
-
-PATH NUMBER =      2622
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.61794811700821E-01,  2.71601619881875E-01)
-X( 2) = (  7.12937451502021E-01,  6.19929826898693E-01)
-X( 3) = ( -2.21198729066327E-01, -1.13824248505268E+00)
-X( 4) = (  1.67557926463498E-01,  2.60792010647937E-01)
-
-X( 5) = (  5.70675546901382E-01,  1.66453808067666E+00)
-
-PATH NUMBER =      2623
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.25520852667133E-01,  4.39834266074385E-01)
-X( 2) = (  3.11584063578717E-01,  6.69310589867355E-01)
-X( 3) = (  4.93852283444524E-02, -9.30403987331130E-01)
-X( 4) = (  9.54241797307428E-02,  3.11541102903938E-01)
-
-X( 5) = (  3.94110010132564E-01,  8.82898684161840E-01)
-
-PATH NUMBER =      2624
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.53755281294566E-01,  3.84025000716782E-01)
-X( 2) = ( -2.76118115600301E-02,  4.49153464073659E-01)
-X( 3) = (  1.23068554164844E-01, -5.97262445881738E-01)
-X( 4) = (  7.54563617976753E-03,  3.04050484379898E-01)
-
-X( 5) = (  4.39927541362919E-01,  5.61357801798243E-01)
-
-PATH NUMBER =      2625
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.69323937107369E-01,  1.30287599320782E-01)
-X( 2) = ( -1.45936654194557E-01,  6.24724154503828E-02)
-X( 3) = ( -3.46259986554638E-02, -2.94698490404498E-01)
-X( 4) = ( -5.49583570007045E-02,  2.41825098732167E-01)
-
-X( 5) = (  5.04089039545404E-01,  3.62832681394223E-01)
-
-PATH NUMBER =      2626
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.71359850271985E-01, -2.02651388023324E-01)
-X( 2) = (  1.19750445779761E-02, -3.09800195870481E-01)
-X( 3) = ( -3.49911396272113E-01, -1.64285158291013E-01)
-X( 4) = ( -6.28414867470236E-02,  1.53980895463448E-01)
-
-X( 5) = (  5.80055690098809E-01,  2.00192172222931E-01)
-
-PATH NUMBER =      2627
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.58910394392037E-01, -4.59006108932550E-01)
-X( 2) = (  3.72234645908857E-01, -4.93473877702682E-01)
-X( 3) = ( -6.75262097133388E-01, -2.67044297019923E-01)
-X( 4) = ( -1.24151490396588E-02,  8.16211535627462E-02)
-
-X( 5) = (  6.84996388591272E-01,  3.20602410661071E-02)
-
-PATH NUMBER =      2628
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.31383030986451E-01, -5.18825340428102E-01)
-X( 2) = (  7.66272678495883E-01, -4.02605673011340E-01)
-X( 3) = ( -8.58442892436029E-01, -5.54893763539357E-01)
-X( 4) = (  7.27256122817959E-02,  5.86038004543536E-02)
-
-X( 5) = (  8.74015347606972E-01, -1.86053213420757E-01)
-
-PATH NUMBER =      2629
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.09382436172489E-01, -4.85566488546203E-01)
-X( 2) = (  9.57653657710943E-01,  4.36058378835117E-02)
-X( 3) = ( -8.22193745765567E-01, -6.58464790055479E-01)
-X( 4) = (  4.98384102300491E-01,  4.86350286498242E-02)
-
-X( 5) = (  7.76902162105123E-01, -1.52595293165738E-02)
-
-PATH NUMBER =      2630
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.40253657499656E-03, -1.73402502279374E-01)
-X( 2) = (  9.36589931518809E-01,  4.47436645509409E-01)
-X( 3) = ( -5.70526370724683E-01, -8.88847192775959E-01)
-X( 4) = (  5.35836308144101E-01,  1.28485389074566E-01)
-
-X( 5) = (  9.88952647565731E-01,  2.97642781685171E-01)
-
-PATH NUMBER =      2631
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.05556171017787E-01,  1.40154130612177E-01)
-X( 2) = (  6.60876741566309E-01,  7.43249489441343E-01)
-X( 3) = ( -2.29651022601735E-01, -9.03561681733766E-01)
-X( 4) = (  5.13199540003119E-01,  2.13728127830690E-01)
-
-X( 5) = (  6.66975720728345E-01,  5.84985421320866E-01)
-
-PATH NUMBER =      2632
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.92871835385741E-01,  3.08386776804687E-01)
-X( 2) = (  2.59523353643005E-01,  7.92630252410006E-01)
-X( 3) = (  4.09329348090448E-02, -6.95723184012213E-01)
-X( 4) = (  4.41065793270363E-01,  2.64477220086690E-01)
-
-X( 5) = (  4.33994505915275E-01,  4.60167778101776E-01)
-
-PATH NUMBER =      2633
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.21106264013174E-01,  2.52577511447084E-01)
-X( 2) = ( -7.96725214957419E-02,  5.72473126616309E-01)
-X( 3) = (  1.14616260629436E-01, -3.62581642562822E-01)
-X( 4) = (  3.53187249719388E-01,  2.56986601562650E-01)
-
-X( 5) = (  3.77379005522642E-01,  3.23360271089907E-01)
-
-PATH NUMBER =      2634
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.36674919825977E-01, -1.15988994891564E-03)
-X( 2) = ( -1.97997364130269E-01,  1.85792077993033E-01)
-X( 3) = ( -4.30782921908714E-02, -6.00176870855809E-02)
-X( 4) = (  2.90683256538916E-01,  1.94761215914919E-01)
-
-X( 5) = (  3.79237035756443E-01,  2.20673829783609E-01)
-
-PATH NUMBER =      2635
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.38710832990593E-01, -3.34098877293022E-01)
-X( 2) = ( -4.00856653577357E-02, -1.86480533327830E-01)
-X( 3) = ( -3.58363689807520E-01,  7.03956450279042E-02)
-X( 4) = (  2.82800126792597E-01,  1.06917012646200E-01)
-
-X( 5) = (  4.08111288985104E-01,  1.36555189821485E-01)
-
-PATH NUMBER =      2636
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.26261377110645E-01, -5.90453598202248E-01)
-X( 2) = (  3.20173935973145E-01, -3.70154215160031E-01)
-X( 3) = ( -6.83714390668795E-01, -3.23634937010067E-02)
-X( 4) = (  3.33226464499962E-01,  3.45572707454984E-02)
-
-X( 5) = (  4.64001690297671E-01,  5.99426729309954E-02)
-
-PATH NUMBER =      2637
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.98734013705060E-01, -6.50272829697800E-01)
-X( 2) = (  7.14211968560171E-01, -2.79286010468690E-01)
-X( 3) = ( -8.66895185971436E-01, -3.20212960220440E-01)
-X( 4) = (  4.18367225821416E-01,  1.15399176371056E-02)
-
-X( 5) = (  5.68799969250263E-01, -8.84358125619979E-03)
-
-PATH NUMBER =      2638
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.29692353419510E-01, -7.58111006392238E-01)
-X( 2) = (  8.38504489046720E-01,  1.04610200803456E-01)
-X( 3) = ( -9.79518490864659E-01, -4.84121894324318E-01)
-X( 4) = (  7.93413020401861E-01,  2.34756149321400E-01)
-
-X( 5) = (  5.07178274873923E-01, -7.73759026143492E-02)
-
-PATH NUMBER =      2639
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.13907380672025E-01, -4.45947020125409E-01)
-X( 2) = (  8.17440762854587E-01,  5.08441008429353E-01)
-X( 3) = ( -7.27851115823776E-01, -7.14504297044798E-01)
-X( 4) = (  8.30865226245471E-01,  3.14606509746142E-01)
-
-X( 5) = (  6.37986069631016E-01,  4.21786247211891E-03)
-
-PATH NUMBER =      2640
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.25866088264808E-01, -1.32390387233858E-01)
-X( 2) = (  5.41727572902087E-01,  8.04253852361288E-01)
-X( 3) = ( -3.86975767700828E-01, -7.29218786002606E-01)
-X( 4) = (  8.08228458104488E-01,  3.99849248502266E-01)
-
-X( 5) = (  6.10131942868114E-01,  1.94638012384800E-01)
-
-PATH NUMBER =      2641
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.13181752632762E-01,  3.58422589586520E-02)
-X( 2) = (  1.40374184978783E-01,  8.53634615329950E-01)
-X( 3) = ( -1.16391810290048E-01, -5.21380288281053E-01)
-X( 4) = (  7.36094711371733E-01,  4.50598340758266E-01)
-
-X( 5) = (  4.59708118584455E-01,  2.34914100165497E-01)
-
-PATH NUMBER =      2642
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.41416181260195E-01, -1.99670063989510E-02)
-X( 2) = ( -1.98821690159964E-01,  6.33477489536254E-01)
-X( 3) = ( -4.27084844696567E-02, -1.88238746831662E-01)
-X( 4) = (  6.48216167820758E-01,  4.43107722234226E-01)
-
-X( 5) = (  3.74870774200910E-01,  1.79913857497533E-01)
-
-PATH NUMBER =      2643
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.05698483707300E+00, -2.73704407794950E-01)
-X( 2) = ( -3.17146532794491E-01,  2.46796440912978E-01)
-X( 3) = ( -2.00403037289964E-01,  1.14325208645579E-01)
-X( 4) = (  5.85712174640286E-01,  3.80882336586495E-01)
-
-X( 5) = (  3.44220225723750E-01,  1.15734680190992E-01)
-
-PATH NUMBER =      2644
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.05902075023761E+00, -6.06643395139057E-01)
-X( 2) = ( -1.59234834021958E-01, -1.25476170407886E-01)
-X( 3) = ( -5.15688434906613E-01,  2.44738540759064E-01)
-X( 4) = (  5.77829044893967E-01,  2.93038133317776E-01)
-
-X( 5) = (  3.42347627740897E-01,  5.64171267011166E-02)
-
-PATH NUMBER =      2645
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.46571294357667E-01, -8.62998116048283E-01)
-X( 2) = (  2.01024767308923E-01, -3.09149852240087E-01)
-X( 3) = ( -8.41039135767889E-01,  1.41979402030154E-01)
-X( 4) = (  6.28255382601332E-01,  2.20678391417074E-01)
-
-X( 5) = (  3.62322022484462E-01,  6.76999670869674E-04)
-
-PATH NUMBER =      2646
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.19043930952081E-01, -9.22817347543834E-01)
-X( 2) = (  5.95062799895949E-01, -2.18281647548745E-01)
-X( 3) = ( -1.02421993107053E+00, -1.45870064489280E-01)
-X( 4) = (  7.13396143922786E-01,  1.97661038308682E-01)
-
-X( 5) = (  4.10781305050282E-01, -5.07117683266497E-02)
-
-PATH NUMBER =      2647
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.46666857819272E-01, -1.04422594391953E+00)
-X( 2) = (  7.08018081867486E-01,  7.47546447024794E-02)
-X( 3) = ( -1.21210169082579E+00, -4.51693884698981E-01)
-X( 4) = (  8.99781933404157E-01,  5.66974132613723E-01)
-
-X( 5) = (  3.82478313915583E-01, -1.55287407697123E-01)
-
-PATH NUMBER =      2648
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.08818850717866E-02, -7.32061957652703E-01)
-X( 2) = (  6.86954355675352E-01,  4.78585452328377E-01)
-X( 3) = ( -9.60434315784908E-01, -6.82076287419462E-01)
-X( 4) = (  9.37234139247767E-01,  6.46824493038465E-01)
-
-X( 5) = (  4.80655082524795E-01, -1.54765063559323E-01)
-
-PATH NUMBER =      2649
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.42840592664570E-01, -4.18505324761153E-01)
-X( 2) = (  4.11241165722853E-01,  7.74398296260311E-01)
-X( 3) = ( -6.19558967661959E-01, -6.96790776377269E-01)
-X( 4) = (  9.14597371106785E-01,  7.32067231794588E-01)
-
-X( 5) = (  5.50483157620205E-01, -4.35340685455039E-02)
-
-PATH NUMBER =      2650
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.30156257032524E-01, -2.50272678568642E-01)
-X( 2) = (  9.88777779954831E-03,  8.23779059228973E-01)
-X( 3) = ( -3.48975010251180E-01, -4.88952278655716E-01)
-X( 4) = (  8.42463624374029E-01,  7.82816324050589E-01)
-
-X( 5) = (  4.81528524742515E-01,  6.22598870376077E-02)
-
-PATH NUMBER =      2651
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.58390685659957E-01, -3.06081943926245E-01)
-X( 2) = ( -3.29308097339198E-01,  6.03621933435277E-01)
-X( 3) = ( -2.75291684430788E-01, -1.55810737206324E-01)
-X( 4) = (  7.54585080823055E-01,  7.75325705526548E-01)
-
-X( 5) = (  3.90940677465802E-01,  6.65634062911952E-02)
-
-PATH NUMBER =      2652
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.73959341472760E-01, -5.59819345322245E-01)
-X( 2) = ( -4.47632939973725E-01,  2.16940884812001E-01)
-X( 3) = ( -4.32986237251096E-01,  1.46753218270916E-01)
-X( 4) = (  6.92081087642583E-01,  7.13100319878818E-01)
-
-X( 5) = (  3.38881257001232E-01,  3.01215025089863E-02)
-
-PATH NUMBER =      2653
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.75995254637376E-01, -8.92758332666352E-01)
-X( 2) = ( -2.89721241201192E-01, -1.55331726508862E-01)
-X( 3) = ( -7.48271634867745E-01,  2.77166550384401E-01)
-X( 4) = (  6.84197957896263E-01,  6.25256116610098E-01)
-
-X( 5) = (  3.15610178088085E-01, -1.48435365156649E-02)
-
-PATH NUMBER =      2654
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.63545798757428E-01, -1.14911305357558E+00)
-X( 2) = (  7.05383601296880E-02, -3.39005408341063E-01)
-X( 3) = ( -1.07362233572902E+00,  1.74407411655491E-01)
-X( 4) = (  7.34624295603628E-01,  5.52896374709397E-01)
-
-X( 5) = (  3.12556033794999E-01, -6.21698563409022E-02)
-
-PATH NUMBER =      2655
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.36018435351843E-01, -1.20893228507113E+00)
-X( 2) = (  4.64576392716714E-01, -2.48137203649722E-01)
-X( 3) = ( -1.25680313103166E+00, -1.13442054863943E-01)
-X( 4) = (  8.19765056925083E-01,  5.29879021601005E-01)
-
-X( 5) = (  3.30826579106237E-01, -1.11270563002164E-01)
-
-PATH NUMBER =      2656
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00845498511273E-01, -1.21003494204573E+00)
-X( 2) = (  6.27250476287282E-01, -3.19910839122251E-02)
-X( 3) = ( -1.41111508151281E+00, -5.76354187280346E-01)
-X( 4) = (  7.67719644754817E-01,  8.89840491952702E-01)
-
-X( 5) = (  3.03246243461873E-01, -2.30346336980741E-01)
-
-PATH NUMBER =      2657
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.16630471258758E-01, -8.97870955778904E-01)
-X( 2) = (  6.06186750095148E-01,  3.71839723713672E-01)
-X( 3) = ( -1.15944770647193E+00, -8.06736590000826E-01)
-X( 4) = (  8.05171850598428E-01,  9.69690852377443E-01)
-
-X( 5) = (  3.72603168708627E-01, -2.76303202268258E-01)
-
-PATH NUMBER =      2658
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04671763665975E-01, -5.84314322887353E-01)
-X( 2) = (  3.30473560142649E-01,  6.67652567645607E-01)
-X( 3) = ( -8.18572358348977E-01, -8.21451078958634E-01)
-X( 4) = (  7.82535082457445E-01,  1.05493359113357E+00)
-
-X( 5) = (  4.85721879015572E-01, -2.41082914521822E-01)
-
-PATH NUMBER =      2659
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.82643900701979E-01, -4.16081676694842E-01)
-X( 2) = ( -7.08798277806554E-02,  7.17033330614268E-01)
-X( 3) = ( -5.47988400938197E-01, -6.13612581237080E-01)
-X( 4) = (  7.10401335724690E-01,  1.10568268338957E+00)
-
-X( 5) = (  5.05196880538044E-01, -1.10449273278872E-01)
-
-PATH NUMBER =      2660
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.10878329329412E-01, -4.71890942052446E-01)
-X( 2) = ( -4.10075702919402E-01,  4.96876204820572E-01)
-X( 3) = ( -4.74305075117806E-01, -2.80471039787689E-01)
-X( 4) = (  6.22522792173715E-01,  1.09819206486553E+00)
-
-X( 5) = (  4.23719166114443E-01, -4.61165311595618E-02)
-
-PATH NUMBER =      2661
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.26446985142215E-01, -7.25628343448445E-01)
-X( 2) = ( -5.28400545553929E-01,  1.10195156197297E-01)
-X( 3) = ( -6.31999627938113E-01,  2.20929156895520E-02)
-X( 4) = (  5.60018798993243E-01,  1.03596667921780E+00)
-
-X( 5) = (  3.52490755411635E-01, -5.29663641051347E-02)
-
-PATH NUMBER =      2662
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.28482898306832E-01, -1.05856733079255E+00)
-X( 2) = ( -3.70488846781396E-01, -2.62077455123567E-01)
-X( 3) = ( -9.47285025554763E-01,  1.52506247803037E-01)
-X( 4) = (  5.52135669246924E-01,  9.48122475949077E-01)
-
-X( 5) = (  3.09144072644365E-01, -8.48697594725144E-02)
-
-PATH NUMBER =      2663
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.16033442426884E-01, -1.31492205170178E+00)
-X( 2) = ( -1.02292454505157E-02, -4.45751136955768E-01)
-X( 3) = ( -1.27263572641604E+00,  4.97471090741266E-02)
-X( 4) = (  6.02562006954289E-01,  8.75762734048376E-01)
-
-X( 5) = (  2.86314749128037E-01, -1.26235582295491E-01)
-
-PATH NUMBER =      2664
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.88506079021298E-01, -1.37474128319733E+00)
-X( 2) = (  3.83808787136511E-01, -3.54882932264426E-01)
-X( 3) = ( -1.45581652171868E+00, -2.38102357445308E-01)
-X( 4) = (  6.87702768275743E-01,  8.52745380939984E-01)
-
-X( 5) = (  2.81738328366981E-01, -1.74893201178877E-01)
-
-PATH NUMBER =      2665
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.97030933251631E-01, -1.17795412778584E+00)
-X( 2) = (  6.33993732589036E-01, -1.65679472275210E-01)
-X( 3) = ( -1.48343808563579E+00, -7.99772861045652E-01)
-X( 4) = (  4.59019567021719E-01,  1.05228246954374E+00)
-
-X( 5) = (  2.40348455601712E-01, -3.13805572192966E-01)
-
-PATH NUMBER =      2666
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.12815905999116E-01, -8.65790141519010E-01)
-X( 2) = (  6.12930006396902E-01,  2.38151335350686E-01)
-X( 3) = ( -1.23177071059490E+00, -1.03015526376613E+00)
-X( 4) = (  4.96471772865329E-01,  1.13213282996848E+00)
-
-X( 5) = (  2.74546373124695E-01, -3.96889067340789E-01)
-
-PATH NUMBER =      2667
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.00857198406333E-01, -5.52233508627460E-01)
-X( 2) = (  3.37216816444403E-01,  5.33964179282622E-01)
-X( 3) = ( -8.90895362471957E-01, -1.04486975272394E+00)
-X( 4) = (  4.73835004724347E-01,  1.21737556872460E+00)
-
-X( 5) = (  4.00328580144295E-01, -4.51641327332249E-01)
-
-PATH NUMBER =      2668
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13541534038379E-01, -3.84000862434949E-01)
-X( 2) = ( -6.41365714789017E-02,  5.83344942251283E-01)
-X( 3) = ( -6.20311405061178E-01, -8.37031255002386E-01)
-X( 4) = (  4.01701257991591E-01,  1.26812466098060E+00)
-
-X( 5) = (  5.38883094971826E-01, -3.35939632374732E-01)
-
-PATH NUMBER =      2669
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.14692894589054E-01, -4.39810127792552E-01)
-X( 2) = ( -4.03332446617649E-01,  3.63187816457587E-01)
-X( 3) = ( -5.46628079240786E-01, -5.03889713552995E-01)
-X( 4) = (  3.13822714440616E-01,  1.26063404245656E+00)
-
-X( 5) = (  4.91437845175411E-01, -1.86099392331217E-01)
-
-PATH NUMBER =      2670
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.30261550401857E-01, -6.93547529188552E-01)
-X( 2) = ( -5.21657289252176E-01, -2.34932321656887E-02)
-X( 3) = ( -7.04322632061093E-01, -2.01325758075754E-01)
-X( 4) = (  2.51318721260144E-01,  1.19840865680883E+00)
-
-X( 5) = (  3.94190964730950E-01, -1.48508125856274E-01)
-
-PATH NUMBER =      2671
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.32297463566474E-01, -1.02648651653266E+00)
-X( 2) = ( -3.63745590479642E-01, -3.95765843486552E-01)
-X( 3) = ( -1.01960802967774E+00, -7.09124259622689E-02)
-X( 4) = (  2.43435591513825E-01,  1.11056445354011E+00)
-
-X( 5) = (  3.23893349295549E-01, -1.64352979518817E-01)
-
-PATH NUMBER =      2672
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.19848007686526E-01, -1.28284123744188E+00)
-X( 2) = ( -3.48598914876199E-03, -5.79439525318754E-01)
-X( 3) = ( -1.34495873053902E+00, -1.73671564691179E-01)
-X( 4) = (  2.93861929221190E-01,  1.03820471163941E+00)
-
-X( 5) = (  2.77504459747116E-01, -2.00027172491665E-01)
-
-PATH NUMBER =      2673
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07679355719060E-01, -1.34266046893744E+00)
-X( 2) = (  3.90552043438264E-01, -4.88571320627412E-01)
-X( 3) = ( -1.52813952584166E+00, -4.61521031210613E-01)
-X( 4) = (  3.79002690542645E-01,  1.01518735853102E+00)
-
-X( 5) = (  2.48691469927950E-01, -2.48841469647111E-01)
-
-PATH NUMBER =      2674
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.60788585976665E-01, -9.33319242833875E-01)
-X( 2) = (  6.10080368768948E-01, -5.39414366826845E-01)
-X( 3) = ( -8.76492954519107E-01, -9.16813935255868E-01)
-X( 4) = ( -1.28676420735780E-01,  8.89764368816186E-01)
-
-X( 5) = ( -1.97786257025177E-02, -4.88050536927172E-01)
-
-PATH NUMBER =      2675
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.76573558724150E-01, -6.21155256567045E-01)
-X( 2) = (  5.89016642576814E-01, -1.35583559200947E-01)
-X( 3) = ( -6.24825579478222E-01, -1.14719633797635E+00)
-X( 4) = ( -9.12242148921697E-02,  9.69614729240928E-01)
-
-X( 5) = ( -1.37054931277250E-01, -5.39469431719190E-01)
-
-PATH NUMBER =      2676
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.64614851131367E-01, -3.07598623675495E-01)
-X( 2) = (  3.13303452624314E-01,  1.60229284730987E-01)
-X( 3) = ( -2.83950231355274E-01, -1.16191082693416E+00)
-X( 4) = ( -1.13860983033152E-01,  1.05485746799705E+00)
-
-X( 5) = ( -2.74295412668350E-01, -6.70884688717126E-01)
-
-PATH NUMBER =      2677
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.77299186763413E-01, -1.39365977482985E-01)
-X( 2) = ( -8.80499352989898E-02,  2.09610047699649E-01)
-X( 3) = ( -1.33662739444952E-02, -9.54072329212603E-01)
-X( 4) = ( -1.85994729765907E-01,  1.10560656025305E+00)
-
-X( 5) = ( -3.39761070203396E-01, -1.03791288772085E+00)
-
-PATH NUMBER =      2678
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.90647581359796E-02, -1.95175242840588E-01)
-X( 2) = ( -4.27245810437737E-01, -1.05470780940470E-02)
-X( 3) = (  6.03170518758965E-02, -6.20930787763211E-01)
-X( 4) = ( -2.73873273316883E-01,  1.09811594172901E+00)
-
-X( 5) = (  2.98519578810392E-01, -1.33983502051134E+00)
-
-PATH NUMBER =      2679
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.66503897676823E-01, -4.48912644236587E-01)
-X( 2) = ( -5.45570653072264E-01, -3.97228126717323E-01)
-X( 3) = ( -9.73775009444111E-02, -3.18366832285971E-01)
-X( 4) = ( -3.36377266497355E-01,  1.03589055608128E+00)
-
-X( 5) = (  5.33897484555750E-01, -7.77377576982362E-01)
-
-PATH NUMBER =      2680
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.68539810841439E-01, -7.81851631580693E-01)
-X( 2) = ( -3.87658954299731E-01, -7.69500738038186E-01)
-X( 3) = ( -4.12662898561060E-01, -1.87953500172486E-01)
-X( 4) = ( -3.44260396243674E-01,  9.48046352812562E-01)
-
-X( 5) = (  3.56163146909646E-01, -5.47891780338800E-01)
-
-PATH NUMBER =      2681
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.39096450385086E-02, -1.03820635248992E+00)
-X( 2) = ( -2.73993529688501E-02, -9.53174419870388E-01)
-X( 3) = ( -7.38013599422335E-01, -2.90712638901396E-01)
-X( 4) = ( -2.93834058536309E-01,  8.75686610911861E-01)
-
-X( 5) = (  2.07641596435837E-01, -4.83382985367907E-01)
-
-PATH NUMBER =      2682
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.71437008444094E-01, -1.09802558398547E+00)
-X( 2) = (  3.66638679618176E-01, -8.62306215179046E-01)
-X( 3) = ( -9.21194394724976E-01, -5.78562105420830E-01)
-X( 4) = ( -2.08693297214855E-01,  8.52669257803468E-01)
-
-X( 5) = (  8.93499156425052E-02, -4.71426748346481E-01)
-
-PATH NUMBER =      2683
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.80627212364728E-01, -6.36062755437977E-01)
-X( 2) = (  7.42908684284863E-01, -5.55988300754790E-01)
-X( 3) = ( -6.69027270296682E-01, -1.02683443599342E+00)
-X( 4) = ( -3.42255745626061E-01,  6.13961892294455E-01)
-
-X( 5) = ( -2.09453028988109E-01, -5.56410531990444E-01)
-
-PATH NUMBER =      2684
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.96412185112213E-01, -3.23898769171148E-01)
-X( 2) = (  7.21844958092729E-01, -1.52157493128893E-01)
-X( 3) = ( -4.17359895255798E-01, -1.25721683871390E+00)
-X( 4) = ( -3.04803539782450E-01,  6.93812252719197E-01)
-
-X( 5) = ( -3.77963098416484E-01, -5.04123696328284E-01)
-
-PATH NUMBER =      2685
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.84453477519430E-01, -1.03421362795971E-02)
-X( 2) = (  4.46131768140230E-01,  1.43655350803041E-01)
-X( 3) = ( -7.64845471328496E-02, -1.27193132767171E+00)
-X( 4) = ( -3.27440307923433E-01,  7.79054991475321E-01)
-
-X( 5) = ( -6.02094399352809E-01, -4.70116569280436E-01)
-
-PATH NUMBER =      2686
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.97137813151476E-01,  1.57890509912913E-01)
-X( 2) = (  4.47783802169256E-02,  1.93036113771703E-01)
-X( 3) = (  1.94099410277930E-01, -1.06409282995016E+00)
-X( 4) = ( -3.99574054656188E-01,  8.29804083731322E-01)
-
-X( 5) = ( -1.00533974524854E+00, -5.04580130163846E-01)
-
-PATH NUMBER =      2687
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.89033845240428E-02,  1.02081244555310E-01)
-X( 2) = ( -2.94417494921822E-01, -2.71210120219926E-02)
-X( 3) = (  2.67782736098321E-01, -7.30951288500764E-01)
-X( 4) = ( -4.87452598207163E-01,  8.22313465207281E-01)
-
-X( 5) = ( -1.94281216963156E+00, -1.32539387772434E+00)
-
-PATH NUMBER =      2688
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.46665271288760E-01, -1.51656156840689E-01)
-X( 2) = ( -4.12742337556348E-01, -4.13802060645269E-01)
-X( 3) = (  1.10088183278014E-01, -4.28387333023523E-01)
-X( 4) = ( -5.49956591387636E-01,  7.60088079559550E-01)
-
-X( 5) = (  5.32125720657656E-01, -2.36379690006424E+00)
-
-PATH NUMBER =      2689
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.48701184453376E-01, -4.84595144184796E-01)
-X( 2) = ( -2.54830638783816E-01, -7.86074671966132E-01)
-X( 3) = ( -2.05197214338635E-01, -2.97974000910038E-01)
-X( 4) = ( -5.57839721133955E-01,  6.72243876290831E-01)
-
-X( 5) = (  4.24638115674515E-01, -1.06247140661671E+00)
-
-PATH NUMBER =      2690
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.37482714265719E-02, -7.40949865094022E-01)
-X( 2) = (  1.05428962547066E-01, -9.69748353798333E-01)
-X( 3) = ( -5.30547915199910E-01, -4.00733139638949E-01)
-X( 4) = ( -5.07413383426590E-01,  5.99884134390129E-01)
-
-X( 5) = (  1.42875355308090E-01, -7.57329560492451E-01)
-
-PATH NUMBER =      2691
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.91275634832158E-01, -8.00769096589573E-01)
-X( 2) = (  4.99466995134092E-01, -8.78880149106991E-01)
-X( 3) = ( -7.13728710502551E-01, -6.88582606158382E-01)
-X( 4) = ( -4.22272622105135E-01,  5.76866781281737E-01)
-
-X( 5) = ( -4.86456654149197E-02, -6.30675561913741E-01)
-
-PATH NUMBER =      2692
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.04751694871391E-01, -3.95599051851835E-01)
-X( 2) = (  8.55314596647332E-01, -4.83304275311749E-01)
-X( 3) = ( -4.39379521074609E-01, -9.77758657959275E-01)
-X( 4) = ( -3.28584585994332E-01,  2.65398794031843E-01)
-
-X( 5) = ( -5.45585439557151E-01, -7.10424547396222E-01)
-
-PATH NUMBER =      2693
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.20536667618877E-01, -8.34350655850062E-02)
-X( 2) = (  8.34250870455198E-01, -7.94734676858518E-02)
-X( 3) = ( -1.87712146033725E-01, -1.20814106067976E+00)
-X( 4) = ( -2.91132380150721E-01,  3.45249154456584E-01)
-
-X( 5) = ( -7.32977548329865E-01, -4.09757610010363E-01)
-
-PATH NUMBER =      2694
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.08577960026093E-01,  2.30121567306545E-01)
-X( 2) = (  5.58537680502699E-01,  2.16339376246083E-01)
-X( 3) = (  1.53163202089223E-01, -1.22285554963756E+00)
-X( 4) = ( -3.13769148291704E-01,  4.30491893212708E-01)
-
-X( 5) = ( -8.83842480365353E-01, -9.23076932943430E-02)
-
-PATH NUMBER =      2695
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.21262295658140E-01,  3.98354213499055E-01)
-X( 2) = (  1.57184292579394E-01,  2.65720139214745E-01)
-X( 3) = (  4.23747159500003E-01, -1.01501705191601E+00)
-X( 4) = ( -3.85902895024459E-01,  4.81240985468709E-01)
-
-X( 5) = ( -1.02324804856092E+00,  3.36438496833459E-01)
-
-PATH NUMBER =      2696
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.06972132969294E-01,  3.42544948141452E-01)
-X( 2) = ( -1.82011582559353E-01,  4.55630134210481E-02)
-X( 3) = (  4.97430485320394E-01, -6.81875510466618E-01)
-X( 4) = ( -4.73781438575435E-01,  4.73750366944668E-01)
-
-X( 5) = ( -1.11294126829937E+00,  1.13955961635679E+00)
-
-PATH NUMBER =      2697
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.22540788782097E-01,  8.88075467454520E-02)
-X( 2) = ( -3.00336425193880E-01, -3.41118035202228E-01)
-X( 3) = (  3.39735932500087E-01, -3.79311554989377E-01)
-X( 4) = ( -5.36285431755907E-01,  4.11524981296937E-01)
-
-X( 5) = (  3.96279366942040E-02,  3.49467426598355E+00)
-
-PATH NUMBER =      2698
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.24576701946713E-01, -2.44131440598654E-01)
-X( 2) = ( -1.42424726421347E-01, -7.13390646523091E-01)
-X( 3) = (  2.44505348834380E-02, -2.48898222875892E-01)
-X( 4) = ( -5.44168561502226E-01,  3.23680778028218E-01)
-
-X( 5) = (  3.32657646918870E+00, -1.72404697375446E+00)
-
-PATH NUMBER =      2699
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12127246066765E-01, -5.00486161507881E-01)
-X( 2) = (  2.17834874909534E-01, -8.97064328355292E-01)
-X( 3) = ( -3.00900165977838E-01, -3.51657361604803E-01)
-X( 4) = ( -4.93742223794861E-01,  2.51321036127517E-01)
-
-X( 5) = (  4.17082656209147E-01, -1.59668556541370E+00)
-
-PATH NUMBER =      2700
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.15400117338821E-01, -5.60305393003432E-01)
-X( 2) = (  6.11872907496560E-01, -8.06196123663951E-01)
-X( 3) = ( -4.84080961280478E-01, -6.39506828124237E-01)
-X( 4) = ( -4.08601462473406E-01,  2.28303683019124E-01)
-
-X( 5) = ( -2.51392797103981E-01, -1.06760588935623E+00)
-
-PATH NUMBER =      2701
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.15456142770437E-01, -3.24443771439788E-01)
-X( 2) = (  8.94702130209391E-01, -3.55371953795484E-01)
-X( 3) = ( -2.95004440964335E-01, -7.92549703112127E-01)
-X( 4) = ( -9.40598293702943E-02,  7.17162155275596E-03)
-
-X( 5) = ( -1.65767700902086E+00, -1.64361775081876E+00)
-
-PATH NUMBER =      2702
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.31241115517923E-01, -1.22797851729585E-02)
-X( 2) = (  8.73638404017257E-01,  4.84588538304138E-02)
-X( 3) = ( -4.33370659234511E-02, -1.02293210583261E+00)
-X( 4) = ( -5.66076235266839E-02,  8.70219819774978E-02)
-
-X( 5) = ( -1.50672965239602E+00,  6.14970773834440E-03)
-
-PATH NUMBER =      2703
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.19282407925140E-01,  3.01276847718592E-01)
-X( 2) = (  5.97925214064758E-01,  3.44271697762348E-01)
-X( 3) = (  2.97538282199497E-01, -1.03764659479042E+00)
-X( 4) = ( -7.92443916676665E-02,  1.72264720733622E-01)
-
-X( 5) = ( -9.64623982418355E-01,  6.05815946703865E-01)
-
-PATH NUMBER =      2704
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.80332564428142E-02,  4.69509493911102E-01)
-X( 2) = (  1.96571826141454E-01,  3.93652460731010E-01)
-X( 3) = (  5.68122239610277E-01, -8.29808097068862E-01)
-X( 4) = ( -1.51378138400422E-01,  2.23013812989622E-01)
-
-X( 5) = ( -4.96394840027144E-01,  8.56909319337637E-01)
-
-PATH NUMBER =      2705
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.96267685070248E-01,  4.13700228553499E-01)
-X( 2) = ( -1.42624048997293E-01,  1.73495334937314E-01)
-X( 3) = (  6.41805565430668E-01, -4.96666555619471E-01)
-X( 4) = ( -2.39256681951397E-01,  2.15523194465582E-01)
-
-X( 5) = ( -5.87069067810665E-02,  9.64546547599041E-01)
-
-PATH NUMBER =      2706
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.11836340883050E-01,  1.59962827157500E-01)
-X( 2) = ( -2.60948891631820E-01, -2.13185713685962E-01)
-X( 3) = (  4.84111012610361E-01, -1.94102600142230E-01)
-X( 4) = ( -3.01760675131869E-01,  1.53297808817851E-01)
-
-X( 5) = (  4.20946787338029E-01,  9.66139889611318E-01)
-
-PATH NUMBER =      2707
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.13872254047667E-01, -1.72976160186607E-01)
-X( 2) = ( -1.03037192859287E-01, -5.85458325006825E-01)
-X( 3) = (  1.68825614993712E-01, -6.36892680287447E-02)
-X( 4) = ( -3.09643804878188E-01,  6.54536055491316E-02)
-
-X( 5) = (  1.04214934574656E+00,  7.84051717590440E-01)
-
-PATH NUMBER =      2708
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.01422798167719E-01, -4.29330881095833E-01)
-X( 2) = (  2.57222408471594E-01, -7.69132006839027E-01)
-X( 3) = ( -1.56525085867564E-01, -1.66448406757656E-01)
-X( 4) = ( -2.59217467170823E-01, -6.90613635156992E-03)
-
-X( 5) = (  1.89058768770917E+00, -8.92305001869887E-03)
-
-PATH NUMBER =      2709
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.38954347621330E-02, -4.89150112591384E-01)
-X( 2) = (  6.51260441058620E-01, -6.78263802147685E-01)
-X( 3) = ( -3.39705881170204E-01, -4.54297873277089E-01)
-X( 4) = ( -1.74076705849369E-01, -2.99234894599626E-02)
-
-X( 5) = (  1.38954936321013E+00, -2.52978463849667E+00)
-
-PATH NUMBER =      2710
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.18948399481704E-02, -4.55891260709486E-01)
-X( 2) = (  8.42641420273679E-01, -2.32052291252833E-01)
-X( 3) = ( -3.03456734499742E-01, -5.57868899793211E-01)
-X( 4) = (  2.51581784169326E-01, -3.98922612644917E-02)
-
-X( 5) = (  2.60031710580916E+00, -6.95110594943943E-01)
-
-PATH NUMBER =      2711
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.38901327993149E-02, -1.43727274442656E-01)
-X( 2) = (  8.21577694081545E-01,  1.71778516373064E-01)
-X( 3) = ( -5.17893594588585E-02, -7.88251302513691E-01)
-X( 4) = (  2.89033990012937E-01,  3.99580991602501E-02)
-
-X( 5) = ( -1.29329773328593E-02,  4.79891324919751E+00)
-
-PATH NUMBER =      2712
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.80685747934684E-02,  1.69829358448894E-01)
-X( 2) = (  5.45864504129046E-01,  4.67591360304999E-01)
-X( 3) = (  2.89085988664090E-01, -8.02965791471499E-01)
-X( 4) = (  2.66397221871954E-01,  1.25200837916374E-01)
-
-X( 5) = ( -1.75071491711683E-01,  1.46591251424577E+00)
-
-PATH NUMBER =      2713
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.35384239161422E-01,  3.38062004641405E-01)
-X( 2) = (  1.44511116205742E-01,  5.16972123273661E-01)
-X( 3) = (  5.59669946074869E-01, -5.95127293749945E-01)
-X( 4) = (  1.94263475139199E-01,  1.75949930172374E-01)
-
-X( 5) = (  1.31912478833797E-01,  9.07224123042699E-01)
-
-PATH NUMBER =      2714
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.63618667788856E-01,  2.82252739283801E-01)
-X( 2) = ( -1.94684758933005E-01,  2.96814997479964E-01)
-X( 3) = (  6.33353271895261E-01, -2.61985752300554E-01)
-X( 4) = (  1.06384931588224E-01,  1.68459311648334E-01)
-
-X( 5) = (  3.16848941978264E-01,  6.53812419297346E-01)
-
-PATH NUMBER =      2715
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.79187323601658E-01,  2.85153378878016E-02)
-X( 2) = ( -3.13009601567532E-01, -8.98660511433117E-02)
-X( 3) = (  4.75658719074953E-01,  4.05782031766870E-02)
-X( 4) = (  4.38809384077517E-02,  1.06233926000603E-01)
-
-X( 5) = (  4.64634236300897E-01,  4.79544934703176E-01)
-
-PATH NUMBER =      2716
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.81223236766275E-01, -3.04423649456305E-01)
-X( 2) = ( -1.55097902794999E-01, -4.62138662464175E-01)
-X( 3) = (  1.60373321458304E-01,  1.70991535290172E-01)
-X( 4) = (  3.59978086614327E-02,  1.83897227318839E-02)
-
-X( 5) = (  6.15690271602603E-01,  3.21709648300172E-01)
-
-PATH NUMBER =      2717
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.68773780886327E-01, -5.60778370365531E-01)
-X( 2) = (  2.05161698535882E-01, -6.45812344296376E-01)
-X( 3) = ( -1.64977379402971E-01,  6.82323965612612E-02)
-X( 4) = (  8.64241463687975E-02, -5.39700191688175E-02)
-
-X( 5) = (  8.15215130345582E-01,  1.38946912172291E-01)
-
-PATH NUMBER =      2718
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.41246417480741E-01, -6.20597601861082E-01)
-X( 2) = (  5.99199731122908E-01, -5.54944139605035E-01)
-X( 3) = ( -3.48158174705612E-01, -2.19617069958172E-01)
-X( 4) = (  1.71564907690252E-01, -7.69873722772103E-02)
-
-X( 5) = (  1.18837035018010E+00, -1.40329908386744E-01)
-
-PATH NUMBER =      2719
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.72204757195192E-01, -7.28435778555521E-01)
-X( 2) = (  7.23492251609457E-01, -1.71047928332889E-01)
-X( 3) = ( -4.60781479598835E-01, -3.83526004062051E-01)
-X( 4) = (  5.46610702270696E-01,  1.46228859407084E-01)
-
-X( 5) = (  8.83252657592348E-01, -3.22356281890141E-01)
-
-PATH NUMBER =      2720
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.64197844477063E-02, -4.16271792288691E-01)
-X( 2) = (  7.02428525417323E-01,  2.32782879293009E-01)
-X( 3) = ( -2.09114104557951E-01, -6.13908406782531E-01)
-X( 4) = (  5.84062908114306E-01,  2.26079219831826E-01)
-
-X( 5) = (  1.54965649262878E+00, -1.46121947765356E-01)
-
-PATH NUMBER =      2721
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.68378492040490E-01, -1.02715159397141E-01)
-X( 2) = (  4.26715335464824E-01,  5.28595723224943E-01)
-X( 3) = (  1.31761243564997E-01, -6.28622895740338E-01)
-X( 4) = (  5.61426139973324E-01,  3.11321958587949E-01)
-
-X( 5) = (  1.17478177759113E+00,  8.47501236478051E-01)
-
-PATH NUMBER =      2722
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.55694156408444E-01,  6.55174867953696E-02)
-X( 2) = (  2.53619475415195E-02,  5.77976486193605E-01)
-X( 3) = (  4.02345200975776E-01, -4.20784398018785E-01)
-X( 4) = (  4.89292393240569E-01,  3.62071050843950E-01)
-
-X( 5) = (  6.16623243580948E-01,  6.27158464228612E-01)
-
-PATH NUMBER =      2723
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.83928585035877E-01,  9.70822143776643E-03)
-X( 2) = ( -3.13833927597227E-01,  3.57819360399909E-01)
-X( 3) = (  4.76028526796168E-01, -8.76428565693936E-02)
-X( 4) = (  4.01413849689594E-01,  3.54580432319910E-01)
-
-X( 5) = (  5.00296489233145E-01,  3.91190074908017E-01)
-
-PATH NUMBER =      2724
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.99497240848679E-01, -2.44029179958233E-01)
-X( 2) = ( -4.32158770231754E-01, -2.88616882233671E-02)
-X( 3) = (  3.18333973975860E-01,  2.14921098907847E-01)
-X( 4) = (  3.38909856509122E-01,  2.92355046672179E-01)
-
-X( 5) = (  4.83250113831153E-01,  2.31781197790315E-01)
-
-PATH NUMBER =      2725
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.00153315401330E+00, -5.76968167302340E-01)
-X( 2) = ( -2.74247071459221E-01, -4.01134299544230E-01)
-X( 3) = (  3.04857635921152E-03,  3.45334431021332E-01)
-X( 4) = (  3.31026726762802E-01,  2.04510843403460E-01)
-
-X( 5) = (  5.00327580190550E-01,  1.03919744918009E-01)
-
-PATH NUMBER =      2726
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.89083698133348E-01, -8.33322888211566E-01)
-X( 2) = (  8.60125298716597E-02, -5.84807981376432E-01)
-X( 3) = ( -3.22302124502064E-01,  2.42575292292421E-01)
-X( 4) = (  3.81453064470167E-01,  1.32151101502758E-01)
-
-X( 5) = (  5.45089123173220E-01, -1.94913503281767E-02)
-
-PATH NUMBER =      2727
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.61556334727762E-01, -8.93142119707117E-01)
-X( 2) = (  4.80050562458686E-01, -4.93939776685090E-01)
-X( 3) = ( -5.05482919804705E-01, -4.52741742270122E-02)
-X( 4) = (  4.66593825791622E-01,  1.09133748394366E-01)
-
-X( 5) = (  6.40385108393016E-01, -1.59733965323937E-01)
-
-PATH NUMBER =      2728
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.91792615949534E-02, -1.01455071608281E+00)
-X( 2) = (  5.93005844430223E-01, -2.00903484433865E-01)
-X( 3) = ( -6.93364679559967E-01, -3.51097994436714E-01)
-X( 4) = (  6.52979615272992E-01,  4.78446842699407E-01)
-
-X( 5) = (  4.88026799188628E-01, -3.63933063165547E-01)
-
-PATH NUMBER =      2729
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.66057111525320E-02, -7.02386729815986E-01)
-X( 2) = (  5.71942118238089E-01,  2.02927323192032E-01)
-X( 3) = ( -4.41697304519083E-01, -5.81480397157195E-01)
-X( 4) = (  6.90431821116603E-01,  5.58297203124149E-01)
-
-X( 5) = (  6.95902254788486E-01, -4.92598941266554E-01)
-
-PATH NUMBER =      2730
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.53529964402515E-02, -3.88830096924435E-01)
-X( 2) = (  2.96228928285590E-01,  4.98740167123966E-01)
-X( 3) = ( -1.00821956396135E-01, -5.96194886115001E-01)
-X( 4) = (  6.67795052975620E-01,  6.43539941880272E-01)
-
-X( 5) = (  1.07588935490039E+00, -2.61684082311515E-01)
-
-PATH NUMBER =      2731
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.72668660808205E-01, -2.20597450731925E-01)
-X( 2) = ( -1.05124459637715E-01,  5.48120930092628E-01)
-X( 3) = (  1.69762001014645E-01, -3.88356388393448E-01)
-X( 4) = (  5.95661306242865E-01,  6.94289034136273E-01)
-
-X( 5) = (  8.70787310784864E-01,  1.51082499330185E-01)
-
-PATH NUMBER =      2732
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.00903089435639E-01, -2.76406716089528E-01)
-X( 2) = ( -4.44320334776462E-01,  3.27963804298932E-01)
-X( 3) = (  2.43445326835036E-01, -5.52148469440567E-02)
-X( 4) = (  5.07782762691890E-01,  6.86798415612232E-01)
-
-X( 5) = (  6.10535871689994E-01,  1.38156067863158E-01)
-
-PATH NUMBER =      2733
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.16471745248441E-01, -5.30144117485527E-01)
-X( 2) = ( -5.62645177410989E-01, -5.87172443243437E-02)
-X( 3) = (  8.57507740147286E-02,  2.47349108533184E-01)
-X( 4) = (  4.45278769511418E-01,  6.24573029964501E-01)
-
-X( 5) = (  4.95546237480372E-01,  4.69677151429463E-02)
-
-PATH NUMBER =      2734
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.18507658413058E-01, -8.63083104829634E-01)
-X( 2) = ( -4.04733478638456E-01, -4.30989855645207E-01)
-X( 3) = ( -2.29534623601920E-01,  3.77762440646669E-01)
-X( 4) = (  4.37395639765099E-01,  5.36728826695782E-01)
-
-X( 5) = (  4.43406199658922E-01, -4.35444240369489E-02)
-
-PATH NUMBER =      2735
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.06058202533110E-01, -1.11943782573886E+00)
-X( 2) = ( -4.44738773075749E-02, -6.14663537477408E-01)
-X( 3) = ( -5.54885324463196E-01,  2.75003301917758E-01)
-X( 4) = (  4.87821977472463E-01,  4.64369084795081E-01)
-
-X( 5) = (  4.22512160191141E-01, -1.34196129482164E-01)
-
-PATH NUMBER =      2736
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.78530839127524E-01, -1.17925705723441E+00)
-X( 2) = (  3.49564155279451E-01, -5.23795332786067E-01)
-X( 3) = ( -7.38066119765836E-01, -1.28461646016754E-02)
-X( 4) = (  5.72962738793918E-01,  4.41351731686688E-01)
-
-X( 5) = (  4.29294116579154E-01, -2.36288436825610E-01)
-
-PATH NUMBER =      2737
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.58333094735591E-01, -1.18035971420901E+00)
-X( 2) = (  5.12238238850019E-01, -3.07649213048570E-01)
-X( 3) = ( -8.92378070246984E-01, -4.75758297018078E-01)
-X( 4) = (  5.20917326623653E-01,  8.01313202038385E-01)
-
-X( 5) = (  2.83335382397794E-01, -4.04069368314220E-01)
-
-PATH NUMBER =      2738
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.74118067483076E-01, -8.68195727942186E-01)
-X( 2) = (  4.91174512657885E-01,  9.61815945773271E-02)
-X( 3) = ( -6.40710695206101E-01, -7.06140699738558E-01)
-X( 4) = (  5.58369532467263E-01,  8.81163562463127E-01)
-
-X( 5) = (  3.23937854518738E-01, -5.45928153537691E-01)
-
-PATH NUMBER =      2739
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.62159359890293E-01, -5.54639095050635E-01)
-X( 2) = (  2.15461322705386E-01,  3.91994438509262E-01)
-X( 3) = ( -2.99835347083152E-01, -7.20855188696366E-01)
-X( 4) = (  5.35732764326280E-01,  9.66406301219251E-01)
-
-X( 5) = (  5.49641684653496E-01, -6.75985358073267E-01)
-
-PATH NUMBER =      2740
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.25156304477661E-01, -3.86406448858125E-01)
-X( 2) = ( -1.85892065217918E-01,  4.41375201477923E-01)
-X( 3) = ( -2.92513896723731E-02, -5.13016690974812E-01)
-X( 4) = (  4.63599017593525E-01,  1.01715539347525E+00)
-
-X( 5) = (  8.30058277582896E-01, -4.17615053583819E-01)
-
-PATH NUMBER =      2741
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.53390733105094E-01, -4.42215714215728E-01)
-X( 2) = ( -5.25087940356666E-01,  2.21218075684227E-01)
-X( 3) = (  4.44319361480185E-02, -1.79875149525421E-01)
-X( 4) = (  3.75720474042550E-01,  1.00966477495121E+00)
-
-X( 5) = (  6.75832939844816E-01, -1.56140635207213E-01)
-
-PATH NUMBER =      2742
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.68959388917896E-01, -6.95953115611727E-01)
-X( 2) = ( -6.43412782991192E-01, -1.65462972939049E-01)
-X( 3) = ( -1.13262616672289E-01,  1.22688805951820E-01)
-X( 4) = (  3.13216480862078E-01,  9.47439389303480E-01)
-
-X( 5) = (  5.06253611291586E-01, -1.33666617560205E-01)
-
-PATH NUMBER =      2743
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.70995302082513E-01, -1.02889210295583E+00)
-X( 2) = ( -4.85501084218659E-01, -5.37735584259912E-01)
-X( 3) = ( -4.28548014288938E-01,  2.53102138065305E-01)
-X( 4) = (  3.05333351115759E-01,  8.59595186034761E-01)
-
-X( 5) = (  4.05415171653665E-01, -1.74708648029847E-01)
-
-PATH NUMBER =      2744
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.58545846202565E-01, -1.28524682386506E+00)
-X( 2) = ( -1.25241482887779E-01, -7.21409266092113E-01)
-X( 3) = ( -7.53898715150213E-01,  1.50342999336394E-01)
-X( 4) = (  3.55759688823123E-01,  7.87235444134059E-01)
-
-X( 5) = (  3.42132375873857E-01, -2.33053542568250E-01)
-
-PATH NUMBER =      2745
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.31018482796979E-01, -1.34506605536061E+00)
-X( 2) = (  2.68796549699248E-01, -6.30541061400772E-01)
-X( 3) = ( -9.37079510452853E-01, -1.37506467183040E-01)
-X( 4) = (  4.40900450144578E-01,  7.64218091025667E-01)
-
-X( 5) = (  3.00960031908936E-01, -3.05892206170364E-01)
-
-PATH NUMBER =      2746
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.54518529475949E-01, -1.14827889994912E+00)
-X( 2) = (  5.18981495151773E-01, -4.41337601411555E-01)
-X( 3) = ( -9.64701074369964E-01, -6.99176970783383E-01)
-X( 4) = (  2.12217248890554E-01,  9.63755179629422E-01)
-
-X( 5) = (  1.30029446857345E-01, -4.42782886167669E-01)
-
-PATH NUMBER =      2747
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.70303502223435E-01, -8.36114913682293E-01)
-X( 2) = (  4.97917768959639E-01, -3.75067937856580E-02)
-X( 3) = ( -7.13033699329081E-01, -9.29559373503864E-01)
-X( 4) = (  2.49669454734165E-01,  1.04360554005416E+00)
-
-X( 5) = (  7.81468080460295E-02, -5.52383031130089E-01)
-
-PATH NUMBER =      2748
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.58344794630651E-01, -5.22558280790742E-01)
-X( 2) = (  2.22204579007140E-01,  2.58306050146276E-01)
-X( 3) = ( -3.72158351206132E-01, -9.44273862461671E-01)
-X( 4) = (  2.27032686593182E-01,  1.12884827881029E+00)
-
-X( 5) = (  9.80633428593742E-02, -7.50179256215236E-01)
-
-PATH NUMBER =      2749
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.71029130262698E-01, -3.54325634598232E-01)
-X( 2) = ( -1.79148808916165E-01,  3.07686813114938E-01)
-X( 3) = ( -1.01574393795353E-01, -7.36435364740118E-01)
-X( 4) = (  1.54898939860427E-01,  1.17959737106629E+00)
-
-X( 5) = (  4.15361884634829E-01, -9.18704783028827E-01)
-
-PATH NUMBER =      2750
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.57205298364736E-01, -4.10134899955835E-01)
-X( 2) = ( -5.18344684054912E-01,  8.75296873212419E-02)
-X( 3) = ( -2.78910679749617E-02, -4.03293823290727E-01)
-X( 4) = (  6.70203963094517E-02,  1.17210675254225E+00)
-
-X( 5) = (  6.65466616784687E-01, -5.81647351063549E-01)
-
-PATH NUMBER =      2751
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.72773954177539E-01, -6.63872301351834E-01)
-X( 2) = ( -6.36669526689439E-01, -2.99151361302034E-01)
-X( 3) = ( -1.85585620795269E-01, -1.00729867813486E-01)
-X( 4) = (  4.51640312897965E-03,  1.10988136689452E+00)
-
-X( 5) = (  5.18001617168112E-01, -3.63389013695454E-01)
-
-PATH NUMBER =      2752
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.74809867342155E-01, -9.96811288695941E-01)
-X( 2) = ( -4.78757827916906E-01, -6.71423972622897E-01)
-X( 3) = ( -5.00871018411918E-01,  2.96834642999992E-02)
-X( 4) = ( -3.36672661733966E-03,  1.02203716362580E+00)
-
-X( 5) = (  3.75627371057596E-01, -3.23749550032548E-01)
-
-PATH NUMBER =      2753
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.62360411462208E-01, -1.25316600960517E+00)
-X( 2) = ( -1.18498226586025E-01, -8.55097654455099E-01)
-X( 3) = ( -8.26221719273193E-01, -7.30756744289108E-02)
-X( 4) = (  4.70596110900256E-02,  9.49677421725096E-01)
-
-X( 5) = (  2.74846311449213E-01, -3.38876444738102E-01)
-
-PATH NUMBER =      2754
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.65166951943379E-01, -1.31298524110072E+00)
-X( 2) = (  2.75539806001001E-01, -7.64229449763757E-01)
-X( 3) = ( -1.00940251457583E+00, -3.60925140948345E-01)
-X( 4) = (  1.32200372411480E-01,  9.26660068616704E-01)
-
-X( 5) = (  1.96606583074981E-01, -3.78319508451255E-01)
-
-PATH NUMBER =      2755
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.85751770844504E-01, -8.73634384887613E-01)
-X( 2) = (  6.99165513307666E-01, -8.24509186039315E-01)
-X( 3) = ( -5.43779141444747E-01, -5.06315288992353E-01)
-X( 4) = ( -2.60833720012991E-01,  6.63307058176314E-01)
-
-X( 5) = ( -2.83053769754878E-01, -5.07189987015087E-01)
-
-PATH NUMBER =      2756
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.01536743591990E-01, -5.61470398620784E-01)
-X( 2) = (  6.78101787115532E-01, -4.20678378413417E-01)
-X( 3) = ( -2.92111766403864E-01, -7.36697691712833E-01)
-X( 4) = ( -2.23381514169380E-01,  7.43157418601055E-01)
-
-X( 5) = ( -4.16986648011277E-01, -4.17186309647528E-01)
-
-PATH NUMBER =      2757
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.89578035999207E-01, -2.47913765729233E-01)
-X( 2) = (  4.02388597163033E-01, -1.24865534481483E-01)
-X( 3) = (  4.87635817190846E-02, -7.51412180670640E-01)
-X( 4) = ( -2.46018282310363E-01,  8.28400157357179E-01)
-
-X( 5) = ( -5.87974090964574E-01, -3.38028936175982E-01)
-
-PATH NUMBER =      2758
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.02262371631253E-01, -7.96811195367228E-02)
-X( 2) = (  1.03520923972847E-03, -7.54847715128207E-02)
-X( 3) = (  3.19347539129864E-01, -5.43573682949087E-01)
-X( 4) = ( -3.18152029043118E-01,  8.79149249613180E-01)
-
-X( 5) = ( -8.73860039760378E-01, -2.75353238726819E-01)
-
-PATH NUMBER =      2759
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.40279430038191E-02, -1.35490384894326E-01)
-X( 2) = ( -3.38160665899019E-01, -2.95641897306517E-01)
-X( 3) = (  3.93030864950255E-01, -2.10432141499696E-01)
-X( 4) = ( -4.06030572594093E-01,  8.71658631089140E-01)
-
-X( 5) = ( -1.54942449444736E+00, -4.37734597979224E-01)
-
-PATH NUMBER =      2760
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.41540712808983E-01, -3.89227786290326E-01)
-X( 2) = ( -4.56485508533546E-01, -6.82322945929793E-01)
-X( 3) = (  2.35336312129948E-01,  9.21318139775452E-02)
-X( 4) = ( -4.68534565774565E-01,  8.09433245441408E-01)
-
-X( 5) = ( -1.15911451262912E+00, -2.46897023260316E+00)
-
-PATH NUMBER =      2761
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.43576625973600E-01, -7.22166773634432E-01)
-X( 2) = ( -2.98573809761012E-01, -1.05459555725066E+00)
-X( 3) = ( -7.99490854867007E-02,  2.22545146091030E-01)
-X( 4) = ( -4.76417695520884E-01,  7.21589042172689E-01)
-
-X( 5) = (  1.40413095096488E-01, -1.33512273747532E+00)
-
-PATH NUMBER =      2762
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.88728299063479E-02, -9.78521494543658E-01)
-X( 2) = (  6.16857915698683E-02, -1.23826923908286E+00)
-X( 3) = ( -4.05299786347976E-01,  1.19786007362119E-01)
-X( 4) = ( -4.25991357813519E-01,  6.49229300271988E-01)
-
-X( 5) = ( -4.07000078324473E-03, -8.30348830981435E-01)
-
-PATH NUMBER =      2763
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.96400193311934E-01, -1.03834072603921E+00)
-X( 2) = (  4.55723824156894E-01, -1.14740103439152E+00)
-X( 3) = ( -5.88480581650617E-01, -1.68063459157314E-01)
-X( 4) = ( -3.40850596492065E-01,  6.26211947163596E-01)
-
-X( 5) = ( -1.53226581898952E-01, -6.26790951839817E-01)
-
-PATH NUMBER =      2764
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.05590397232568E-01, -5.76377897491716E-01)
-X( 2) = (  8.31993828823582E-01, -8.41083119967261E-01)
-X( 3) = ( -3.36313457222322E-01, -6.16335789729905E-01)
-X( 4) = ( -4.74413044903272E-01,  3.87504581654583E-01)
-
-X( 5) = ( -4.67659143842112E-01, -3.57832084808643E-01)
-
-PATH NUMBER =      2765
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.21375369980053E-01, -2.64213911224886E-01)
-X( 2) = (  8.10930102631448E-01, -4.37252312341363E-01)
-X( 3) = ( -8.46460821814384E-02, -8.46718192450385E-01)
-X( 4) = ( -4.36960839059661E-01,  4.67354942079324E-01)
-
-X( 5) = ( -4.95507369137457E-01, -2.11072852071128E-01)
-
-PATH NUMBER =      2766
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.09416662387270E-01,  4.93427216666646E-02)
-X( 2) = (  5.35216912678949E-01, -1.41439468409429E-01)
-X( 3) = (  2.56229265941510E-01, -8.61432681408192E-01)
-X( 4) = ( -4.59597607200643E-01,  5.52597680835448E-01)
-
-X( 5) = ( -5.47417759495720E-01, -8.06584157554259E-02)
-
-PATH NUMBER =      2767
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.22100998019316E-01,  2.17575367859175E-01)
-X( 2) = (  1.33863524755644E-01, -9.20587054407664E-02)
-X( 3) = (  5.26813223352289E-01, -6.53594183686639E-01)
-X( 4) = ( -5.31731353933399E-01,  6.03346773091449E-01)
-
-X( 5) = ( -6.39414915533757E-01,  5.91410179661214E-02)
-
-PATH NUMBER =      2768
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.38665693918824E-02,  1.61766102501572E-01)
-X( 2) = ( -2.05332350383103E-01, -3.12215831234463E-01)
-X( 3) = (  6.00496549172681E-01, -3.20452642237248E-01)
-X( 4) = ( -6.19609897484374E-01,  5.95856154567408E-01)
-
-X( 5) = ( -8.40301425220969E-01,  2.29607800390904E-01)
-
-PATH NUMBER =      2769
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.21702086420920E-01, -9.19712988944278E-02)
-X( 2) = ( -3.23657193017630E-01, -6.98896879857739E-01)
-X( 3) = (  4.42801996352373E-01, -1.78886867600071E-02)
-X( 4) = ( -6.82113890664846E-01,  5.33630768919678E-01)
-
-X( 5) = ( -1.43936628492840E+00,  3.01855867511801E-01)
-
-PATH NUMBER =      2770
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.23737999585537E-01, -4.24910286238534E-01)
-X( 2) = ( -1.65745494245097E-01, -1.07116949117860E+00)
-X( 3) = (  1.27516598735725E-01,  1.12524645353478E-01)
-X( 4) = ( -6.89997020411165E-01,  4.45786565650959E-01)
-
-X( 5) = ( -1.66720016900685E+00, -1.04009902413444E+00)
-
-PATH NUMBER =      2771
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.87114562944112E-02, -6.81265007147760E-01)
-X( 2) = (  1.94514107085784E-01, -1.25484317301080E+00)
-X( 3) = ( -1.97834102125551E-01,  9.76550662456701E-03)
-X( 4) = ( -6.39570682703800E-01,  3.73426823750257E-01)
-
-X( 5) = ( -6.42159820476014E-01, -9.12769573615764E-01)
-
-PATH NUMBER =      2772
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.16238819699997E-01, -7.41084238643312E-01)
-X( 2) = (  5.88552139672810E-01, -1.16397496831946E+00)
-X( 3) = ( -3.81014897428192E-01, -2.78083959894867E-01)
-X( 4) = ( -5.54429921382346E-01,  3.50409470641864E-01)
-
-X( 5) = ( -4.77127075158261E-01, -5.62102733815627E-01)
-
-PATH NUMBER =      2773
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.29714879739231E-01, -3.35914193905574E-01)
-X( 2) = (  9.44399741186050E-01, -7.68399094524220E-01)
-X( 3) = ( -1.06665708000249E-01, -5.67260011695759E-01)
-X( 4) = ( -4.60741885271543E-01,  3.89414833919694E-02)
-
-X( 5) = ( -6.58711494101034E-01, -1.57423051516694E-01)
-
-PATH NUMBER =      2774
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.45499852486716E-01, -2.37502076387445E-02)
-X( 2) = (  9.23336014993916E-01, -3.64568286898322E-01)
-X( 3) = (  1.45001667040634E-01, -7.97642414416240E-01)
-X( 4) = ( -4.23289679427932E-01,  1.18791843816711E-01)
-
-X( 5) = ( -5.56663438725529E-01, -1.20541722936492E-02)
-
-PATH NUMBER =      2775
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.33541144893932E-01,  2.89806425252807E-01)
-X( 2) = (  6.47622825041417E-01, -6.87554429663875E-02)
-X( 3) = (  4.85877015163583E-01, -8.12356903374047E-01)
-X( 4) = ( -4.45926447568915E-01,  2.04034582572835E-01)
-
-X( 5) = ( -5.07151491241363E-01,  1.15018745209838E-01)
-
-PATH NUMBER =      2776
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.46225480525979E-01,  4.58039071445317E-01)
-X( 2) = (  2.46269437118112E-01, -1.93746799977255E-02)
-X( 3) = (  7.56460972574362E-01, -6.04518405652494E-01)
-X( 4) = ( -5.18060194301670E-01,  2.54783674828836E-01)
-
-X( 5) = ( -4.85240866333118E-01,  2.46516064611757E-01)
-
-PATH NUMBER =      2777
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.20089481014546E-02,  4.02229806087713E-01)
-X( 2) = ( -9.29264380206344E-02, -2.39531805791422E-01)
-X( 3) = (  8.30144298394753E-01, -2.71376864203102E-01)
-X( 4) = ( -6.05938737852645E-01,  2.47293056304796E-01)
-
-X( 5) = ( -4.95708342308675E-01,  4.11306385834128E-01)
-
-PATH NUMBER =      2778
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.97577603914257E-01,  1.48492404691713E-01)
-X( 2) = ( -2.11251280655161E-01, -6.26212854414698E-01)
-X( 3) = (  6.72449745574445E-01,  3.11870912741385E-02)
-X( 4) = ( -6.68442731033117E-01,  1.85067670657065E-01)
-
-X( 5) = ( -6.00891352864482E-01,  6.61100966966872E-01)
-
-PATH NUMBER =      2779
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.99613517078874E-01, -1.84446582652393E-01)
-X( 2) = ( -5.33395818826285E-02, -9.98485465735561E-01)
-X( 3) = (  3.57164347957797E-01,  1.61600423387623E-01)
-X( 4) = ( -6.76325860779436E-01,  9.72234673883457E-02)
-
-X( 5) = ( -1.16555104395201E+00,  9.41570858930898E-01)
-
-PATH NUMBER =      2780
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.71640611989255E-02, -4.40801303561619E-01)
-X( 2) = (  3.06920019448252E-01, -1.18215914756776E+00)
-X( 3) = (  3.18136470965219E-02,  5.88412846587125E-02)
-X( 4) = ( -6.25899523072072E-01,  2.48637254876441E-02)
-
-X( 5) = ( -1.64962919188233E+00, -1.20614717058590E-01)
-
-PATH NUMBER =      2781
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.40363302206660E-01, -5.00620535057170E-01)
-X( 2) = (  7.00958052035279E-01, -1.09129094287642E+00)
-X( 3) = ( -1.51367148206119E-01, -2.29008181860721E-01)
-X( 4) = ( -5.40758761750617E-01,  1.84637237925115E-03)
-
-X( 5) = ( -9.18598170361799E-01, -3.28627138257869E-01)
-
-PATH NUMBER =      2782
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.40419327638277E-01, -2.64758913493526E-01)
-X( 2) = (  9.83787274748110E-01, -6.40466773007954E-01)
-X( 3) = (  3.77093721100244E-02, -3.82051056848612E-01)
-X( 4) = ( -2.26217128647505E-01, -2.19285689087117E-01)
-
-X( 5) = ( -8.96933942200827E-01,  2.03516315973778E-01)
-
-PATH NUMBER =      2783
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.56204300385763E-01,  4.74050727733032E-02)
-X( 2) = (  9.62723548555976E-01, -2.36635965382056E-01)
-X( 3) = (  2.89376747150908E-01, -6.12433459569092E-01)
-X( 4) = ( -1.88764922803895E-01, -1.39435328662375E-01)
-
-X( 5) = ( -6.13897397642201E-01,  2.35611160463888E-01)
-
-PATH NUMBER =      2784
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.44245592792979E-01,  3.60961705664854E-01)
-X( 2) = (  6.87010358603477E-01,  5.91768785498781E-02)
-X( 3) = (  6.30252095273857E-01, -6.27147948526899E-01)
-X( 4) = ( -2.11401690944877E-01, -5.41925899062517E-02)
-
-X( 5) = ( -4.59003876744295E-01,  3.08880137044930E-01)
-
-PATH NUMBER =      2785
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.30700715749750E-02,  5.29194351857364E-01)
-X( 2) = (  2.85656970680172E-01,  1.08557641518540E-01)
-X( 3) = (  9.00836052684636E-01, -4.19309450805346E-01)
-X( 4) = ( -2.83535437677632E-01, -3.44349765025108E-03)
-
-X( 5) = ( -3.50795226228649E-01,  3.93506488105296E-01)
-
-PATH NUMBER =      2786
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.71304500202409E-01,  4.73385086499761E-01)
-X( 2) = ( -5.35389044585744E-02, -1.11599484275156E-01)
-X( 3) = (  9.74519378505027E-01, -8.61679093559546E-02)
-X( 4) = ( -3.71413981228607E-01, -1.09341161742914E-02)
-
-X( 5) = ( -2.59849215462758E-01,  4.99757527200465E-01)
-
-PATH NUMBER =      2787
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.86873156015211E-01,  2.19647685103761E-01)
-X( 2) = ( -1.71863747093101E-01, -4.98280532898432E-01)
-X( 3) = (  8.16824825684719E-01,  2.16396046121286E-01)
-X( 4) = ( -4.33917974409079E-01, -7.31595018220222E-02)
-
-X( 5) = ( -1.76524583040402E-01,  6.61017675372207E-01)
-
-PATH NUMBER =      2788
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.88909069179827E-01, -1.13291302240345E-01)
-X( 2) = ( -1.39520483205685E-02, -8.70553144219295E-01)
-X( 3) = (  5.01539428068071E-01,  3.46809378234771E-01)
-X( 4) = ( -4.41801104155398E-01, -1.61003705090741E-01)
-
-X( 5) = ( -1.39623750326466E-01,  9.76862240718132E-01)
-
-PATH NUMBER =      2789
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.76459613299879E-01, -3.69646023149571E-01)
-X( 2) = (  3.46307553010312E-01, -1.05422682605150E+00)
-X( 3) = (  1.76188727206796E-01,  2.44050239505860E-01)
-X( 4) = ( -3.91374766448034E-01, -2.33363446991443E-01)
-
-X( 5) = ( -6.62572067776324E-01,  1.57393204408508E+00)
-
-PATH NUMBER =      2790
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.89322498942934E-02, -4.29465254645122E-01)
-X( 2) = (  7.40345585597338E-01, -9.63358621360155E-01)
-X( 3) = ( -6.99206809584493E-03, -4.37992270135736E-02)
-X( 4) = ( -3.06234005126579E-01, -2.56380800099835E-01)
-
-X( 5) = ( -1.45799848628172E+00,  5.90135576681910E-01)
-
-PATH NUMBER =      2791
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.69316550803310E-02, -3.96206402763224E-01)
-X( 2) = (  9.31726564812398E-01, -5.17147110465303E-01)
-X( 3) = (  2.92570785746167E-02, -1.47370253529695E-01)
-X( 4) = (  1.19424484892116E-01, -2.66349571904365E-01)
-
-X( 5) = ( -1.11287112809028E+00,  1.25031551856304E+00)
-
-PATH NUMBER =      2792
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.88533176671544E-02, -8.40424164963948E-02)
-X( 2) = (  9.10662838620264E-01, -1.13316302839406E-01)
-X( 3) = (  2.80924453615501E-01, -3.77752656250175E-01)
-X( 4) = (  1.56876690735726E-01, -1.86499211479623E-01)
-
-X( 5) = ( -6.66126342928240E-01,  6.60755463920231E-01)
-
-PATH NUMBER =      2793
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.31053899256290E-02,  2.29514216395156E-01)
-X( 2) = (  6.34949648667765E-01,  1.82496541092529E-01)
-X( 3) = (  6.21799801738449E-01, -3.92467145207983E-01)
-X( 4) = (  1.34239922594744E-01, -1.01256472723499E-01)
-
-X( 5) = ( -3.84514128384723E-01,  5.58433303439019E-01)
-
-PATH NUMBER =      2794
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.10421054293583E-01,  3.97746862587666E-01)
-X( 2) = (  2.33596260744460E-01,  2.31877304061191E-01)
-X( 3) = (  8.92383759149228E-01, -1.84628647486430E-01)
-X( 4) = (  6.21061758619886E-02, -5.05073804674988E-02)
-
-X( 5) = ( -2.00475536962168E-01,  5.42584907727153E-01)
-
-PATH NUMBER =      2795
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.38655482921016E-01,  3.41937597230063E-01)
-X( 2) = ( -1.05599614394287E-01,  1.17201782674943E-02)
-X( 3) = (  9.66067084969620E-01,  1.48512893962962E-01)
-X( 4) = ( -2.57723676889865E-02, -5.79979989915391E-02)
-
-X( 5) = ( -4.87788217165040E-02,  5.57274114880317E-01)
-
-PATH NUMBER =      2796
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.54224138733819E-01,  8.82001958340632E-02)
-X( 2) = ( -2.23924457028813E-01, -3.74960870355782E-01)
-X( 3) = (  8.08372532149312E-01,  4.51076849440203E-01)
-X( 4) = ( -8.82763608694585E-02, -1.20223384639270E-01)
-
-X( 5) = (  1.05968595574289E-01,  5.99395258085648E-01)
-
-PATH NUMBER =      2797
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.56260051898436E-01, -2.44738791510044E-01)
-X( 2) = ( -6.60127582562803E-02, -7.47233481676645E-01)
-X( 3) = (  4.93087134532663E-01,  5.81490181553688E-01)
-X( 4) = ( -9.61594906157775E-02, -2.08067587907989E-01)
-
-X( 5) = (  3.00167455559071E-01,  6.98172691018011E-01)
-
-PATH NUMBER =      2798
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.43810596018487E-01, -5.01093512419269E-01)
-X( 2) = (  2.94246843074600E-01, -9.30907163508846E-01)
-X( 3) = (  1.67736433671388E-01,  4.78731042824777E-01)
-X( 4) = ( -4.57331529084128E-02, -2.80427329808690E-01)
-
-X( 5) = (  5.84642859007513E-01,  9.99685213742469E-01)
-
-PATH NUMBER =      2799
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.16283232612902E-01, -5.60912743914820E-01)
-X( 2) = (  6.88284875661626E-01, -8.40038958817505E-01)
-X( 3) = ( -1.54443616312527E-02,  1.90881576305343E-01)
-X( 4) = (  3.94076084130417E-02, -3.03444682917083E-01)
-
-X( 5) = (  3.63937586543557E-01,  2.19076276651334E+00)
-
-PATH NUMBER =      2800
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.47241572327353E-01, -6.68750920609259E-01)
-X( 2) = (  8.12577396148176E-01, -4.56142747545359E-01)
-X( 3) = ( -1.28067666524476E-01,  2.69726422014654E-02)
-X( 4) = (  4.14453402993486E-01, -8.02284512327887E-02)
-
-X( 5) = (  2.68280421556914E+00,  1.96060971078573E+00)
-
-PATH NUMBER =      2801
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.14565995798670E-02, -3.56586934342430E-01)
-X( 2) = (  7.91513669956042E-01, -5.23119399194613E-02)
-X( 3) = (  1.23599708516408E-01, -2.03409760519015E-01)
-X( 4) = (  4.51905608837096E-01, -3.78090808046800E-04)
-
-X( 5) = ( -4.73996680450057E-01,  1.96055164437719E+00)
-
-PATH NUMBER =      2802
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.43415307172650E-01, -4.30303014508792E-02)
-X( 2) = (  5.15800480003543E-01,  2.43500904012473E-01)
-X( 3) = (  4.64475056639356E-01, -2.18124249476822E-01)
-X( 4) = (  4.29268840696114E-01,  8.48646479480768E-02)
-
-X( 5) = ( -2.10226250001343E-01,  1.01336971629692E+00)
-
-PATH NUMBER =      2803
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.30730971540604E-01,  1.25202344741631E-01)
-X( 2) = (  1.14447092080238E-01,  2.92881666981135E-01)
-X( 3) = (  7.35059014050135E-01, -1.02857517552692E-02)
-X( 4) = (  3.57135093963358E-01,  1.35613740204077E-01)
-
-X( 5) = (  2.23827504277532E-02,  7.38443721244631E-01)
-
-PATH NUMBER =      2804
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.58965400168038E-01,  6.93930793840279E-02)
-X( 2) = ( -2.24748783058509E-01,  7.27245411874388E-02)
-X( 3) = (  8.08742339870527E-01,  3.22855789694122E-01)
-X( 4) = (  2.69256550412383E-01,  1.28123121680037E-01)
-
-X( 5) = (  1.92104490124765E-01,  5.99797952463427E-01)
-
-PATH NUMBER =      2805
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.74534055980840E-01, -1.84344322011972E-01)
-X( 2) = ( -3.43073625693035E-01, -3.13956507435837E-01)
-X( 3) = (  6.51047787050219E-01,  6.25419745171363E-01)
-X( 4) = (  2.06752557231911E-01,  6.58977360323058E-02)
-
-X( 5) = (  3.45867056879855E-01,  5.03791155224140E-01)
-
-PATH NUMBER =      2806
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.76569969145457E-01, -5.17283309356078E-01)
-X( 2) = ( -1.85161926920503E-01, -6.86229118756700E-01)
-X( 3) = (  3.35762389433571E-01,  7.55833077284848E-01)
-X( 4) = (  1.98869427485592E-01, -2.19464672364131E-02)
-
-X( 5) = (  5.20299496306201E-01,  4.21732048256889E-01)
-
-PATH NUMBER =      2807
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.64120513265509E-01, -7.73638030265304E-01)
-X( 2) = (  1.75097674410378E-01, -8.69902800588901E-01)
-X( 3) = (  1.04116885722953E-02,  6.53073938555937E-01)
-X( 4) = (  2.49295765192957E-01, -9.43062091371146E-02)
-
-X( 5) = (  7.76844323611569E-01,  3.44125695212275E-01)
-
-PATH NUMBER =      2808
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.36593149859923E-01, -8.33457261760856E-01)
-X( 2) = (  5.69135706997404E-01, -7.79034595897560E-01)
-X( 3) = ( -1.72769106730346E-01,  3.65224472036504E-01)
-X( 4) = (  3.34436526514412E-01, -1.17323562245507E-01)
-
-X( 5) = (  1.32079944277283E+00,  3.24686859654276E-01)
-
-PATH NUMBER =      2809
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.42160767271142E-02, -9.54865858136553E-01)
-X( 2) = (  6.82090988968941E-01, -4.85998303646335E-01)
-X( 3) = ( -3.60650866485608E-01,  5.94006518268020E-02)
-X( 4) = (  5.20822315995782E-01,  2.51989532059534E-01)
-
-X( 5) = (  1.10424755972686E+00, -8.66111398626367E-01)
-
-PATH NUMBER =      2810
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.15688960203711E-02, -6.42701871869724E-01)
-X( 2) = (  6.61027262776808E-01, -8.21674960204380E-02)
-X( 3) = ( -1.08983491444724E-01, -1.70981750893678E-01)
-X( 4) = (  5.58274521839392E-01,  3.31839892484276E-01)
-
-X( 5) = (  3.42044507458769E+00, -2.30254978224635E+00)
-
-PATH NUMBER =      2811
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.03898115724122E-02, -3.29145238978173E-01)
-X( 2) = (  3.85314072824308E-01,  2.13645347911496E-01)
-X( 3) = (  2.31891856678224E-01, -1.85696239851486E-01)
-X( 4) = (  5.35637753698410E-01,  4.17082631240399E-01)
-
-X( 5) = (  9.88576487722450E-01,  2.67658944914521E+00)
-
-PATH NUMBER =      2812
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.47705475940366E-01, -1.60912592785663E-01)
-X( 2) = ( -1.60393150989961E-02,  2.63026110880158E-01)
-X( 3) = (  5.02475814089003E-01,  2.21422578700676E-02)
-X( 4) = (  4.63504006965655E-01,  4.67831723496400E-01)
-
-X( 5) = (  5.35524502468242E-01,  1.09825211226396E+00)
-
-PATH NUMBER =      2813
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.75939904567800E-01, -2.16721858143266E-01)
-X( 2) = ( -3.55235190237743E-01,  4.28689850864622E-02)
-X( 3) = (  5.76159139909395E-01,  3.55283799319459E-01)
-X( 4) = (  3.75625463414680E-01,  4.60341104972360E-01)
-
-X( 5) = (  5.55460323461151E-01,  6.19725571000555E-01)
-
-PATH NUMBER =      2814
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.91508560380602E-01, -4.70459259539266E-01)
-X( 2) = ( -4.73560032872270E-01, -3.43812063536814E-01)
-X( 3) = (  4.18464587089087E-01,  6.57847754796700E-01)
-X( 4) = (  3.13121470234208E-01,  3.98115719324629E-01)
-
-X( 5) = (  5.97237692178511E-01,  3.51348750931264E-01)
-
-PATH NUMBER =      2815
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.93544473545219E-01, -8.03398246883373E-01)
-X( 2) = ( -3.15648334099737E-01, -7.16084674857677E-01)
-X( 3) = (  1.03179189472438E-01,  7.88261086910185E-01)
-X( 4) = (  3.05238340487888E-01,  3.10271516055910E-01)
-
-X( 5) = (  6.45935881683509E-01,  1.41131248781122E-01)
-
-PATH NUMBER =      2816
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.81095017665271E-01, -1.05975296779260E+00)
-X( 2) = (  4.46112672311437E-02, -8.99758356689878E-01)
-X( 3) = ( -2.22171511388837E-01,  6.85501948181274E-01)
-X( 4) = (  3.55664678195253E-01,  2.37911774155208E-01)
-
-X( 5) = (  7.10236260618043E-01, -7.16660837878766E-02)
-
-PATH NUMBER =      2817
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.53567654259685E-01, -1.11957219928815E+00)
-X( 2) = (  4.38649299818169E-01, -8.08890151998537E-01)
-X( 3) = ( -4.05352306691477E-01,  3.97652481661841E-01)
-X( 4) = (  4.40805439516708E-01,  2.14894421046815E-01)
-
-X( 5) = (  8.19084483528998E-01, -3.50776199343196E-01)
-
-PATH NUMBER =      2818
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.83296279603431E-01, -1.12067485626275E+00)
-X( 2) = (  6.01323383388738E-01, -5.92744032261040E-01)
-X( 3) = ( -5.59664257172625E-01, -6.52596507545623E-02)
-X( 4) = (  3.88760027346442E-01,  5.74855891398513E-01)
-
-X( 5) = (  2.88153391553104E-01, -7.90293970480997E-01)
-
-PATH NUMBER =      2819
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.99081252350916E-01, -8.08510869995924E-01)
-X( 2) = (  5.80259657196604E-01, -1.88913224635143E-01)
-X( 3) = ( -3.07996882131742E-01, -2.95642053475043E-01)
-X( 4) = (  4.26212233190053E-01,  6.54706251823254E-01)
-
-X( 5) = (  7.20684943299820E-02, -1.22646551092694E+00)
-
-PATH NUMBER =      2820
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87122544758133E-01, -4.94954237104373E-01)
-X( 2) = (  3.04546467244105E-01,  1.06899619296792E-01)
-X( 3) = (  3.28784659912067E-02, -3.10356542432850E-01)
-X( 4) = (  4.03575465049070E-01,  7.39948990579378E-01)
-
-X( 5) = ( -2.61636703746279E-01, -2.84664063312777E+00)
-
-PATH NUMBER =      2821
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.00193119609821E-01, -3.26721590911863E-01)
-X( 2) = ( -9.68069206791998E-02,  1.56280382265454E-01)
-X( 3) = (  3.03462423401986E-01, -1.02518044711297E-01)
-X( 4) = (  3.31441718316315E-01,  7.90698082835379E-01)
-
-X( 5) = (  4.50564643777278E+00,  1.28450878226022E+00)
-
-PATH NUMBER =      2822
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.28427548237255E-01, -3.82530856269466E-01)
-X( 2) = ( -4.36002795817947E-01, -6.38767435282428E-02)
-X( 3) = (  3.77145749222377E-01,  2.30623496738095E-01)
-X( 4) = (  2.43563174765340E-01,  7.83207464311339E-01)
-
-X( 5) = (  1.38578241523475E+00,  4.65112885493669E-01)
-
-PATH NUMBER =      2823
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.43996204050057E-01, -6.36268257665466E-01)
-X( 2) = ( -5.54327638452474E-01, -4.50557792151519E-01)
-X( 3) = (  2.19451196402070E-01,  5.33187452215335E-01)
-X( 4) = (  1.81059181584868E-01,  7.20982078663608E-01)
-
-X( 5) = (  9.14760583444531E-01,  4.58487876430297E-02)
-
-PATH NUMBER =      2824
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.46032117214674E-01, -9.69207245009572E-01)
-X( 2) = ( -3.96415939679941E-01, -8.22830403472382E-01)
-X( 3) = ( -9.58342012145787E-02,  6.63600784328820E-01)
-X( 4) = (  1.73176051838548E-01,  6.33137875394889E-01)
-
-X( 5) = (  7.04750645518469E-01, -1.88549955985787E-01)
-
-PATH NUMBER =      2825
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.33582661334726E-01, -1.22556196591880E+00)
-X( 2) = ( -3.61563383490603E-02, -1.00650408530458E+00)
-X( 3) = ( -4.21184902075854E-01,  5.60841645599910E-01)
-X( 4) = (  2.23602389545913E-01,  5.60778133494187E-01)
-
-X( 5) = (  5.61960622108177E-01, -3.70495641844984E-01)
-
-PATH NUMBER =      2826
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.06055297929140E-01, -1.28538119741435E+00)
-X( 2) = (  3.57881694237966E-01, -9.15635880613242E-01)
-X( 3) = ( -6.04365697378495E-01,  2.72992179080476E-01)
-X( 4) = (  3.08743150867368E-01,  5.37760780385794E-01)
-
-X( 5) = (  4.34061074641128E-01, -5.53027961101475E-01)
-
-PATH NUMBER =      2827
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.79481714343789E-01, -1.08859404200286E+00)
-X( 2) = (  6.08066639690491E-01, -7.26432420624026E-01)
-X( 3) = ( -6.31987261295605E-01, -2.88678324519868E-01)
-X( 4) = (  8.00599496133436E-02,  7.37297868989550E-01)
-
-X( 5) = ( -6.10710036743373E-02, -6.44861421283312E-01)
-
-PATH NUMBER =      2828
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.95266687091275E-01, -7.76430055736031E-01)
-X( 2) = (  5.87002913498358E-01, -3.22601612998128E-01)
-X( 3) = ( -3.80319886254722E-01, -5.19060727240349E-01)
-X( 4) = (  1.17512155456954E-01,  8.17148229414291E-01)
-
-X( 5) = ( -2.84624842521397E-01, -6.94666732855626E-01)
-
-PATH NUMBER =      2829
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.83307979498491E-01, -4.62873422844480E-01)
-X( 2) = (  3.11289723545858E-01, -2.67887690661937E-02)
-X( 3) = ( -3.94445381317732E-02, -5.33775216198156E-01)
-X( 4) = (  9.48753873159713E-02,  9.02390968170415E-01)
-
-X( 5) = ( -6.27163490201138E-01, -8.24080313577782E-01)
-
-PATH NUMBER =      2830
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.95992315130537E-01, -2.94640776651970E-01)
-X( 2) = ( -9.00636643774461E-02,  2.25919939024682E-02)
-X( 3) = (  2.31139419279006E-01, -3.25936718476603E-01)
-X( 4) = (  2.27416405832162E-02,  9.53140060426416E-01)
-
-X( 5) = ( -1.38185890019193E+00, -1.43763532593235E+00)
-
-PATH NUMBER =      2831
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.32242113496896E-01, -3.50450042009573E-01)
-X( 2) = ( -4.29259539516193E-01, -1.97565131891228E-01)
-X( 3) = (  3.04822745099397E-01,  7.20482297278873E-03)
-X( 4) = ( -6.51369029677591E-02,  9.45649441902375E-01)
-
-X( 5) = (  1.91032844845089E+00, -4.03696813118948E+00)
-
-PATH NUMBER =      2832
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.47810769309699E-01, -6.04187443405573E-01)
-X( 2) = ( -5.47584382150720E-01, -5.84246180514504E-01)
-X( 3) = (  1.47128192279090E-01,  3.09768778450030E-01)
-X( 4) = ( -1.27640896148231E-01,  8.83424056254644E-01)
-
-X( 5) = (  1.27225421726213E+00, -8.64665654914252E-01)
-
-PATH NUMBER =      2833
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.49846682474315E-01, -9.37126430749679E-01)
-X( 2) = ( -3.89672683378187E-01, -9.56518791835367E-01)
-X( 3) = ( -1.68157205337559E-01,  4.40182110563514E-01)
-X( 4) = ( -1.35524025894550E-01,  7.95579852985926E-01)
-
-X( 5) = (  6.45711783357573E-01, -6.48185852058991E-01)
-
-PATH NUMBER =      2834
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.37397226594367E-01, -1.19348115165891E+00)
-X( 2) = ( -2.94130820473062E-02, -1.14019247366757E+00)
-X( 3) = ( -4.93507906198834E-01,  3.37422971834604E-01)
-X( 4) = ( -8.50976881871858E-02,  7.23220111085224E-01)
-
-X( 5) = (  3.42936497593802E-01, -6.17384258683417E-01)
-
-PATH NUMBER =      2835
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.90130136811219E-01, -1.25330038315446E+00)
-X( 2) = (  3.64624950539720E-01, -1.04932426897623E+00)
-X( 3) = ( -6.76688701501475E-01,  4.95735053151698E-02)
-X( 4) = (  4.30731342689506E-05,  7.00202757976831E-01)
-
-X( 5) = (  1.31522893299844E-01, -6.21963654417321E-01)
-
-PATH NUMBER =      2836
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.66509992721307E-01, -8.11867105188172E-01)
-X( 2) = (  9.50664110621602E-01, -9.85641660942414E-01)
-X( 3) = ( -5.52769017401494E-01,  2.20092345014379E-02)
-X( 4) = ( -2.16508131339663E-01,  4.04881619251944E-01)
-
-X( 5) = ( -7.09957831277722E-01, -3.99553127394105E-01)
-
-PATH NUMBER =      2837
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.82294965468792E-01, -4.99703118921343E-01)
-X( 2) = (  9.29600384429468E-01, -5.81810853316516E-01)
-X( 3) = ( -3.01101642360610E-01, -2.08373168219043E-01)
-X( 4) = ( -1.79055925496053E-01,  4.84731979676686E-01)
-
-X( 5) = ( -6.70593419878010E-01, -1.39682589408154E-01)
-
-PATH NUMBER =      2838
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.70336257876008E-01, -1.86146486029792E-01)
-X( 2) = (  6.53887194476969E-01, -2.85998009384582E-01)
-X( 3) = (  3.97737057623383E-02, -2.23087657176850E-01)
-X( 4) = ( -2.01692693637035E-01,  5.69974718432810E-01)
-
-X( 5) = ( -6.54732733712715E-01,  7.22422381557692E-02)
-
-PATH NUMBER =      2839
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.83020593508055E-01, -1.79138398372817E-02)
-X( 2) = (  2.52533806553665E-01, -2.36617246415920E-01)
-X( 3) = (  3.10357663173118E-01, -1.52491594552967E-02)
-X( 4) = ( -2.73826440369791E-01,  6.20723810688810E-01)
-
-X( 5) = ( -6.53508335956100E-01,  2.94645249427823E-01)
-
-PATH NUMBER =      2840
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.47861648806211E-02, -7.37231051948852E-02)
-X( 2) = ( -8.66620685850824E-02, -4.56774372209617E-01)
-X( 3) = (  3.84040988993509E-01,  3.17892381994095E-01)
-X( 4) = ( -3.61704983920766E-01,  6.13233192164770E-01)
-
-X( 5) = ( -6.77442501439695E-01,  5.99037689609819E-01)
-
-PATH NUMBER =      2841
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.60782490932181E-01, -3.27460506590885E-01)
-X( 2) = ( -2.04986911219609E-01, -8.43455420832892E-01)
-X( 3) = (  2.26346436173201E-01,  6.20456337471336E-01)
-X( 4) = ( -4.24208977101238E-01,  5.51007806517039E-01)
-
-X( 5) = ( -8.15902962727763E-01,  1.20218649730597E+00)
-
-PATH NUMBER =      2842
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.62818404096798E-01, -6.60399493934991E-01)
-X( 2) = ( -4.70752124470766E-02, -1.21572803215376E+00)
-X( 3) = ( -8.89389614434471E-02,  7.50869669584821E-01)
-X( 4) = ( -4.32092106847557E-01,  4.63163603248320E-01)
-
-X( 5) = ( -3.10990241871258E+00,  3.26837624219791E+00)
-
-PATH NUMBER =      2843
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.96310517831502E-02, -9.16754214844217E-01)
-X( 2) = (  3.13184388883804E-01, -1.39940171398596E+00)
-X( 3) = ( -4.14289662304722E-01,  6.48110530855910E-01)
-X( 4) = ( -3.81665769140192E-01,  3.90803861347619E-01)
-
-X( 5) = ( -1.60156928357388E+00, -2.05035415815937E+00)
-
-PATH NUMBER =      2844
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.77158415188736E-01, -9.76573446339769E-01)
-X( 2) = (  7.07222421470831E-01, -1.30853350929462E+00)
-X( 3) = ( -5.97470457607364E-01,  3.60261064336476E-01)
-X( 4) = ( -2.96525007818738E-01,  3.67786508239226E-01)
-
-X( 5) = ( -8.27672327029853E-01, -8.35069092214023E-01)
-
-PATH NUMBER =      2845
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.86348619109370E-01, -5.14610617792274E-01)
-X( 2) = (  1.08349242613752E+00, -1.00221559487036E+00)
-X( 3) = ( -3.45303333179069E-01, -8.80112662361145E-02)
-X( 4) = ( -4.30087456229944E-01,  1.29079142730213E-01)
-
-X( 5) = ( -6.28853698784657E-01, -5.19932136583456E-02)
-
-PATH NUMBER =      2846
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.02133591856855E-01, -2.02446631525445E-01)
-X( 2) = (  1.06242869994538E+00, -5.98384787244462E-01)
-X( 3) = ( -9.36359581381848E-02, -3.18393668956595E-01)
-X( 4) = ( -3.92635250386333E-01,  2.08929503154955E-01)
-
-X( 5) = ( -5.11653090825039E-01,  4.58487213879062E-02)
-
-PATH NUMBER =      2847
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.90174884264072E-01,  1.11110001366106E-01)
-X( 2) = (  7.86715509992885E-01, -3.02571943312528E-01)
-X( 3) = (  2.47239389984763E-01, -3.33108157914402E-01)
-X( 4) = ( -4.15272018527316E-01,  2.94172241911079E-01)
-
-X( 5) = ( -4.50400397303276E-01,  1.42336945348254E-01)
-
-PATH NUMBER =      2848
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.02859219896118E-01,  2.79342647558616E-01)
-X( 2) = (  3.85362122069580E-01, -2.53191180343866E-01)
-X( 3) = (  5.17823347395543E-01, -1.25269660192849E-01)
-X( 4) = ( -4.87405765260071E-01,  3.44921334167079E-01)
-
-X( 5) = ( -4.17682547062245E-01,  2.44978629065025E-01)
-
-PATH NUMBER =      2849
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.46247912686842E-02,  2.23533382201013E-01)
-X( 2) = (  4.61662469308333E-02, -4.73348306137562E-01)
-X( 3) = (  5.91506673215934E-01,  2.07871881256543E-01)
-X( 4) = ( -5.75284308811047E-01,  3.37430715643039E-01)
-
-X( 5) = ( -4.12990017063459E-01,  3.71597822967558E-01)
-
-PATH NUMBER =      2850
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.40943864544118E-01, -3.02040191949867E-02)
-X( 2) = ( -7.21585957036937E-02, -8.60029354760838E-01)
-X( 3) = (  4.33812120395627E-01,  5.10435836733783E-01)
-X( 4) = ( -6.37788301991519E-01,  2.75205329995308E-01)
-
-X( 5) = ( -4.74999887485522E-01,  5.51724799458064E-01)
-
-PATH NUMBER =      2851
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.42979777708735E-01, -3.63143006539093E-01)
-X( 2) = (  8.57531030688391E-02, -1.23230196608170E+00)
-X( 3) = (  1.18526722778978E-01,  6.40849168847269E-01)
-X( 4) = ( -6.45671431737838E-01,  1.87361126726589E-01)
-
-X( 5) = ( -7.90240671871850E-01,  7.53920801382428E-01)
-
-PATH NUMBER =      2852
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.94696781712133E-02, -6.19497727448319E-01)
-X( 2) = (  4.46012704399720E-01, -1.41597564791390E+00)
-X( 3) = ( -2.06823978082297E-01,  5.38090030118358E-01)
-X( 4) = ( -5.95245094030473E-01,  1.15001384825887E-01)
-
-X( 5) = ( -1.27495799828201E+00,  2.87930532896973E-01)
-
-PATH NUMBER =      2853
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.96997041576799E-01, -6.79316958943871E-01)
-X( 2) = (  8.40050736986746E-01, -1.32510744322256E+00)
-X( 3) = ( -3.90004773384938E-01,  2.50240563598924E-01)
-X( 4) = ( -5.10104332709018E-01,  9.19840317174946E-02)
-
-X( 5) = ( -8.89461666086940E-01, -1.06439252626679E-01)
-
-PATH NUMBER =      2854
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.10473101616033E-01, -2.74146914206133E-01)
-X( 2) = (  1.19589833849999E+00, -9.29531569427319E-01)
-X( 3) = ( -1.15655583956996E-01, -3.89354882019688E-02)
-X( 4) = ( -4.16416296598215E-01, -2.19483955532400E-01)
-
-X( 5) = ( -5.39457306802472E-01,  1.80652329987093E-01)
-
-PATH NUMBER =      2855
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.26258074363518E-01,  3.80170720606966E-02)
-X( 2) = (  1.17483461230785E+00, -5.25700761801421E-01)
-X( 3) = (  1.36011791083888E-01, -2.69317890922449E-01)
-X( 4) = ( -3.78964090754605E-01, -1.39633595107658E-01)
-
-X( 5) = ( -4.17814846786331E-01,  1.77845516910900E-01)
-
-PATH NUMBER =      2856
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.14299366770734E-01,  3.51573704952247E-01)
-X( 2) = (  8.99121422355353E-01, -2.29887917869487E-01)
-X( 3) = (  4.76887139206836E-01, -2.84032379880256E-01)
-X( 4) = ( -4.01600858895587E-01, -5.43908563515345E-02)
-
-X( 5) = ( -3.39929330461274E-01,  2.14137595550224E-01)
-
-PATH NUMBER =      2857
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.26983702402781E-01,  5.19806351144757E-01)
-X( 2) = (  4.97768034432048E-01, -1.80507154900825E-01)
-X( 3) = (  7.47471096617615E-01, -7.61938821587034E-02)
-X( 4) = ( -4.73734605628342E-01, -3.64176409553356E-03)
-
-X( 5) = ( -2.87612285028362E-01,  2.66804065649407E-01)
-
-PATH NUMBER =      2858
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.01250726224653E-01,  4.63997085787154E-01)
-X( 2) = (  1.58572159293302E-01, -4.00664280694521E-01)
-X( 3) = (  8.21154422438007E-01,  2.56947659290688E-01)
-X( 4) = ( -5.61613149179317E-01, -1.11323826195740E-02)
-
-X( 5) = ( -2.53897532848458E-01,  3.37121983640162E-01)
-
-PATH NUMBER =      2859
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.16819382037455E-01,  2.10259684391155E-01)
-X( 2) = (  4.02473166587747E-02, -7.87345329317798E-01)
-X( 3) = (  6.63459869617699E-01,  5.59511614767929E-01)
-X( 4) = ( -6.24117142359790E-01, -7.33577682673047E-02)
-
-X( 5) = ( -2.48423858605364E-01,  4.36871351549382E-01)
-
-PATH NUMBER =      2860
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.18855295202072E-01, -1.22679302952952E-01)
-X( 2) = (  1.98159015431308E-01, -1.15961794063866E+00)
-X( 3) = (  3.48174472001051E-01,  6.89924946881414E-01)
-X( 4) = ( -6.32000272106109E-01, -1.61201971536024E-01)
-
-X( 5) = ( -3.25074445051274E-01,  5.72571786889987E-01)
-
-PATH NUMBER =      2861
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.06405839322123E-01, -3.79034023862178E-01)
-X( 2) = (  5.58418616762189E-01, -1.34329162247086E+00)
-X( 3) = (  2.28237711397752E-02,  5.87165808152503E-01)
-X( 4) = ( -5.81573934398744E-01, -2.33561713436725E-01)
-
-X( 5) = ( -5.83004056754920E-01,  5.99520268247996E-01)
-
-PATH NUMBER =      2862
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.21121524083462E-01, -4.38853255357729E-01)
-X( 2) = (  9.52456649349215E-01, -1.25242341777952E+00)
-X( 3) = ( -1.60357024162865E-01,  2.99316341633069E-01)
-X( 4) = ( -4.96433173077290E-01, -2.56579066545118E-01)
-
-X( 5) = ( -6.87556081304285E-01,  3.19754007825752E-01)
-
-PATH NUMBER =      2863
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.21177549515079E-01, -2.02991633794085E-01)
-X( 2) = (  1.23528587206205E+00, -8.01599247911053E-01)
-X( 3) = (  2.87194961532782E-02,  1.46273466645179E-01)
-X( 4) = ( -1.81891539974177E-01, -4.77711128011487E-01)
-
-X( 5) = ( -4.34566215146901E-01,  3.84394215139275E-01)
-
-PATH NUMBER =      2864
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.36962522262564E-01,  1.09172352472744E-01)
-X( 2) = (  1.21422214586991E+00, -3.97768440285156E-01)
-X( 3) = (  2.80386871194162E-01, -8.41089360753017E-02)
-X( 4) = ( -1.44439334130567E-01, -3.97860767586745E-01)
-
-X( 5) = ( -3.42717831766241E-01,  3.00314833299088E-01)
-
-PATH NUMBER =      2865
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.25003814669781E-01,  4.22728985364295E-01)
-X( 2) = (  9.38508955917413E-01, -1.01955596353221E-01)
-X( 3) = (  6.21262219317110E-01, -9.88234250331087E-02)
-X( 4) = ( -1.67076102271550E-01, -3.12618028830621E-01)
-
-X( 5) = ( -2.60433468546982E-01,  2.87560189700308E-01)
-
-PATH NUMBER =      2866
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.23118496981729E-02,  5.90961631556805E-01)
-X( 2) = (  5.37155567994108E-01, -5.25748333845594E-02)
-X( 3) = (  8.91846176727889E-01,  1.09015072688444E-01)
-X( 4) = ( -2.39209849004305E-01, -2.61868936574620E-01)
-
-X( 5) = ( -1.96467672408247E-01,  3.04949303135088E-01)
-
-PATH NUMBER =      2867
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.90546278325606E-01,  5.35152366199202E-01)
-X( 2) = (  1.97959692855361E-01, -2.72731959178256E-01)
-X( 3) = (  9.65529502548281E-01,  4.42156614137836E-01)
-X( 4) = ( -3.27088392555280E-01, -2.69359555098660E-01)
-
-X( 5) = ( -1.45085909967756E-01,  3.42297307764434E-01)
-
-PATH NUMBER =      2868
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.06114934138409E-01,  2.81414964803202E-01)
-X( 2) = (  7.96348502208348E-02, -6.59413007801532E-01)
-X( 3) = (  8.07834949727973E-01,  7.44720569615076E-01)
-X( 4) = ( -3.89592385735752E-01, -3.31584940746392E-01)
-
-X( 5) = ( -1.06228632917190E-01,  4.04338239772572E-01)
-
-PATH NUMBER =      2869
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.08150847303025E-01, -5.15240225409037E-02)
-X( 2) = (  2.37546548993367E-01, -1.03168561912239E+00)
-X( 3) = (  4.92549552111325E-01,  8.75133901728562E-01)
-X( 4) = ( -3.97475515482072E-01, -4.19429144015111E-01)
-
-X( 5) = ( -9.92979683256437E-02,  5.05548911691662E-01)
-
-PATH NUMBER =      2870
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.95701391423077E-01, -3.07878743450130E-01)
-X( 2) = (  5.97806150324249E-01, -1.21535930095460E+00)
-X( 3) = (  1.67198851250049E-01,  7.72374762999650E-01)
-X( 4) = ( -3.47049177774707E-01, -4.91788885915813E-01)
-
-X( 5) = ( -2.00270715442316E-01,  6.30284875209102E-01)
-
-PATH NUMBER =      2871
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.81740280174915E-02, -3.67697974945681E-01)
-X( 2) = (  9.91844182911275E-01, -1.12449109626325E+00)
-X( 3) = ( -1.59819440525912E-02,  4.84525296480217E-01)
-X( 4) = ( -2.61908416453252E-01, -5.14806239024205E-01)
-
-X( 5) = ( -4.15867548255200E-01,  5.78095253811349E-01)
-
-PATH NUMBER =      2872
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.61734332035289E-02, -3.34439123063783E-01)
-X( 2) = (  1.18322516212633E+00, -6.78279585368402E-01)
-X( 3) = (  2.02672026178704E-02,  3.80954269964095E-01)
-X( 4) = (  1.63750073565443E-01, -5.24775010828734E-01)
-
-X( 5) = ( -2.84068986693405E-01,  6.09682668300115E-01)
-
-PATH NUMBER =      2873
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.96115395439564E-02, -2.22751367969537E-02)
-X( 2) = (  1.16216143593420E+00, -2.74448777742505E-01)
-X( 3) = (  2.71934577658754E-01,  1.50571867243615E-01)
-X( 4) = (  2.01202279409054E-01, -4.44924650403992E-01)
-
-X( 5) = ( -2.66579120003594E-01,  4.46004709298248E-01)
-
-PATH NUMBER =      2874
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.23471680488270E-02,  2.91281496094597E-01)
-X( 2) = (  8.86448245981701E-01,  2.13640661894291E-02)
-X( 3) = (  6.12809925781702E-01,  1.35857378285808E-01)
-X( 4) = (  1.78565511268071E-01, -3.59681911647869E-01)
-
-X( 5) = ( -1.89987602394914E-01,  3.76745973039151E-01)
-
-PATH NUMBER =      2875
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.29662832416781E-01,  4.59514142287107E-01)
-X( 2) = (  4.85094858058396E-01,  7.07448291580910E-02)
-X( 3) = (  8.83393883192482E-01,  3.43695876007361E-01)
-X( 4) = (  1.06431764535316E-01, -3.08932819391868E-01)
-
-X( 5) = ( -1.17639681594130E-01,  3.57655468912043E-01)
-
-PATH NUMBER =      2876
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.57897261044214E-01,  4.03704876929504E-01)
-X( 2) = (  1.45898982919650E-01, -1.49412296635605E-01)
-X( 3) = (  9.57077209012873E-01,  6.76837417456752E-01)
-X( 4) = (  1.85532209843403E-02, -3.16423437915908E-01)
-
-X( 5) = ( -5.26417048631499E-02,  3.65243278273071E-01)
-
-PATH NUMBER =      2877
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.73465916857016E-01,  1.49967475533504E-01)
-X( 2) = (  2.75741402851228E-02, -5.36093345258881E-01)
-X( 3) = (  7.99382656192565E-01,  9.79401372933993E-01)
-X( 4) = ( -4.39507721961319E-02, -3.78648823563639E-01)
-
-X( 5) = (  8.71135725849962E-03,  3.96765977024938E-01)
-
-PATH NUMBER =      2878
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.75501830021633E-01, -1.82971511810602E-01)
-X( 2) = (  1.85485839057655E-01, -9.08365956579745E-01)
-X( 3) = (  4.84097258575917E-01,  1.10981470504748E+00)
-X( 4) = ( -5.18339019424510E-02, -4.66493026832359E-01)
-
-X( 5) = (  6.37094858863091E-02,  4.65153556103748E-01)
-
-PATH NUMBER =      2879
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.63052374141685E-01, -4.39326232719828E-01)
-X( 2) = (  5.45745440388537E-01, -1.09203963841195E+00)
-X( 3) = (  1.58746557714642E-01,  1.00705556631857E+00)
-X( 4) = ( -1.40756423508584E-03, -5.38852768733060E-01)
-
-X( 5) = (  7.45176135971356E-02,  5.97967455139741E-01)
-
-PATH NUMBER =      2880
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.35525010736099E-01, -4.99145464215379E-01)
-X( 2) = (  9.39783472975563E-01, -1.00117143372060E+00)
-X( 3) = ( -2.44342375879989E-02,  7.19206099799134E-01)
-X( 4) = (  8.37331970863687E-02, -5.61870121841453E-01)
-
-X( 5) = ( -8.54989256055300E-02,  7.33202296486362E-01)
-
-PATH NUMBER =      2881
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.66483350450550E-01, -6.06983640909818E-01)
-X( 2) = (  1.06407599346211E+00, -6.17275222448458E-01)
-X( 3) = ( -1.37057542481223E-01,  5.55297165695255E-01)
-X( 4) = (  4.58778991666813E-01, -3.38653890157158E-01)
-
-X( 5) = (  1.05427344213138E-02,  9.26708733348089E-01)
-
-PATH NUMBER =      2882
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.06983777030650E-02, -2.94819654642989E-01)
-X( 2) = (  1.04301226726998E+00, -2.13444414822560E-01)
-X( 3) = (  1.14609832559661E-01,  3.24914762974775E-01)
-X( 4) = (  4.96231197510423E-01, -2.58803529732416E-01)
-
-X( 5) = ( -1.70702034278255E-01,  6.80076246458265E-01)
-
-PATH NUMBER =      2883
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.62657085295848E-01,  1.87369782485619E-02)
-X( 2) = (  7.67299077317479E-01,  8.23684291093735E-02)
-X( 3) = (  4.55485180682609E-01,  3.10200274016968E-01)
-X( 4) = (  4.73594429369441E-01, -1.73560790976293E-01)
-
-X( 5) = ( -1.18753043476866E-01,  5.13835728650943E-01)
-
-PATH NUMBER =      2884
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.49972749663802E-01,  1.86969624441072E-01)
-X( 2) = (  3.65945689394174E-01,  1.31749192078036E-01)
-X( 3) = (  7.26069138093389E-01,  5.18038771738522E-01)
-X( 4) = (  4.01460682636686E-01, -1.22811698720292E-01)
-
-X( 5) = ( -3.70636818323876E-02,  4.40470870095413E-01)
-
-PATH NUMBER =      2885
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.78207178291236E-01,  1.31160359083469E-01)
-X( 2) = (  2.67498142554274E-02, -8.84079337156610E-02)
-X( 3) = (  7.99752463913780E-01,  8.51180313187913E-01)
-X( 4) = (  3.13582139085710E-01, -1.30302317244332E-01)
-
-X( 5) = (  4.30616504930341E-02,  4.09812266498377E-01)
-
-PATH NUMBER =      2886
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.93775834104038E-01, -1.22577042312531E-01)
-X( 2) = ( -9.15750283790992E-02, -4.75088982338937E-01)
-X( 3) = (  6.42057911093472E-01,  1.15374426866515E+00)
-X( 4) = (  2.51078145905238E-01, -1.92527702892063E-01)
-
-X( 5) = (  1.25351084260239E-01,  4.05612443759400E-01)
-
-PATH NUMBER =      2887
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.95811747268654E-01, -4.55516029656637E-01)
-X( 2) = (  6.63366703934336E-02, -8.47361593659800E-01)
-X( 3) = (  3.26772513476824E-01,  1.28415760077864E+00)
-X( 4) = (  2.43195016158919E-01, -2.80371906160782E-01)
-
-X( 5) = (  2.18393636620867E-01,  4.32823901130137E-01)
-
-PATH NUMBER =      2888
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.83362291388706E-01, -7.11870750565863E-01)
-X( 2) = (  4.26596271724315E-01, -1.03103527549200E+00)
-X( 3) = (  1.42181261554843E-03,  1.18139846204973E+00)
-X( 4) = (  2.93621353866284E-01, -3.52731648061484E-01)
-
-X( 5) = (  3.23439770742265E-01,  5.27235116164725E-01)
-
-PATH NUMBER =      2889
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.55834927983121E-01, -7.71689982061414E-01)
-X( 2) = (  8.20634304311340E-01, -9.40167070800659E-01)
-X( 3) = ( -1.81758982687092E-01,  8.93548995530294E-01)
-X( 4) = (  3.78762115187739E-01, -3.75749001169877E-01)
-
-X( 5) = (  3.46866025288457E-01,  7.72937047457514E-01)
-
-PATH NUMBER =      2890
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.34578548503124E-02, -8.93098578437112E-01)
-X( 2) = (  9.33589586282878E-01, -6.47130778549435E-01)
-X( 3) = ( -3.69640742442354E-01,  5.87725175320593E-01)
-X( 4) = (  5.65147904669110E-01, -6.43590686483558E-03)
-
-X( 5) = (  1.02483570176870E+00,  1.43372376581076E+00)
-
-PATH NUMBER =      2891
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.23271178971731E-02, -5.80934592170283E-01)
-X( 2) = (  9.12525860090743E-01, -2.43299970923537E-01)
-X( 3) = ( -1.17973367401470E-01,  3.57342772600112E-01)
-X( 4) = (  6.02600110512720E-01,  7.34144535599062E-02)
-
-X( 5) = ( -5.02309190949818E-02,  1.30364151552801E+00)
-
-PATH NUMBER =      2892
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.96315896956102E-02, -2.67377959278732E-01)
-X( 2) = (  6.36812670138244E-01,  5.25128730083968E-02)
-X( 3) = (  2.22901980721478E-01,  3.42628283642305E-01)
-X( 4) = (  5.79963342371737E-01,  1.58657192316030E-01)
-
-X( 5) = ( -7.16473647459764E-02,  8.06549844153201E-01)
-
-PATH NUMBER =      2893
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.66947254063564E-01, -9.91453130862218E-02)
-X( 2) = (  2.35459282214940E-01,  1.01893635977059E-01)
-X( 3) = (  4.93485938132257E-01,  5.50466781363858E-01)
-X( 4) = (  5.07829595638982E-01,  2.09406284572030E-01)
-
-X( 5) = (  4.74753760192565E-02,  6.07158349099086E-01)
-
-PATH NUMBER =      2894
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.95181682690998E-01, -1.54954578443825E-01)
-X( 2) = ( -1.03736592923807E-01, -1.18263489816637E-01)
-X( 3) = (  5.67169263952648E-01,  8.83608322813250E-01)
-X( 4) = (  4.19951052088007E-01,  2.01915666047990E-01)
-
-X( 5) = (  1.60811069641159E-01,  5.05593117231574E-01)
-
-PATH NUMBER =      2895
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.10750338503800E-01, -4.08691979839825E-01)
-X( 2) = ( -2.22061435558333E-01, -5.04944538439913E-01)
-X( 3) = (  4.09474711132341E-01,  1.18617227829049E+00)
-X( 4) = (  3.57447058907535E-01,  1.39690280400259E-01)
-
-X( 5) = (  2.74300350133610E-01,  4.42142907689862E-01)
-
-PATH NUMBER =      2896
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.12786251668417E-01, -7.41630967183931E-01)
-X( 2) = ( -6.41497367858010E-02, -8.77217149760776E-01)
-X( 3) = (  9.41893135156929E-02,  1.31658561040398E+00)
-X( 4) = (  3.49563929161216E-01,  5.18460771315397E-02)
-
-X( 5) = (  4.08353630817893E-01,  4.00926461079676E-01)
-
-PATH NUMBER =      2897
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.00336795788469E-01, -9.97985688093157E-01)
-X( 2) = (  2.96109864545080E-01, -1.06089083159298E+00)
-X( 3) = ( -2.31161387345583E-01,  1.21382647167506E+00)
-X( 4) = (  3.99990266868581E-01, -2.05136647691618E-02)
-
-X( 5) = (  6.02168391992756E-01,  3.93859123783324E-01)
-
-PATH NUMBER =      2898
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.72809432382883E-01, -1.05780491958871E+00)
-X( 2) = (  6.90147897132106E-01, -9.70022626901636E-01)
-X( 3) = ( -4.14342182648224E-01,  9.25977005155631E-01)
-X( 4) = (  4.85131028190035E-01, -4.35310178775541E-02)
-
-X( 5) = (  9.39279301090757E-01,  5.38924324307879E-01)
-
-PATH NUMBER =      2899
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.64054501480232E-01, -1.05890757656331E+00)
-X( 2) = (  8.52821980702674E-01, -7.53876507164140E-01)
-X( 3) = ( -5.68654133129372E-01,  4.63064872739229E-01)
-X( 4) = (  4.33085616019770E-01,  3.16430452474143E-01)
-
-X( 5) = (  2.27488994157721E+00, -2.77701710890172E+00)
-
-PATH NUMBER =      2900
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.79839474227718E-01, -7.46743590296483E-01)
-X( 2) = (  8.31758254510540E-01, -3.50045699538242E-01)
-X( 3) = ( -3.16986758088488E-01,  2.32682470018748E-01)
-X( 4) = (  4.70537821863380E-01,  3.96280812898885E-01)
-
-X( 5) = ( -4.42303985653560E+00,  2.14760955662468E+00)
-
-PATH NUMBER =      2901
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.67880766634935E-01, -4.33186957404932E-01)
-X( 2) = (  5.56045064558041E-01, -5.42328556063077E-02)
-X( 3) = (  2.38885900344603E-02,  2.17967981060941E-01)
-X( 4) = (  4.47901053722397E-01,  4.81523551655009E-01)
-
-X( 5) = ( -7.00836157808125E-01,  1.47528328301638E+00)
-
-PATH NUMBER =      2902
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.19434897733019E-01, -2.64954311212422E-01)
-X( 2) = (  1.54691676634736E-01, -4.85209263764591E-03)
-X( 3) = (  2.94472547445240E-01,  4.25806478782494E-01)
-X( 4) = (  3.75767306989642E-01,  5.32272643911009E-01)
-
-X( 5) = ( -2.75911972896018E-02,  1.04104698688527E+00)
-
-PATH NUMBER =      2903
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.47669326360453E-01, -3.20763576570025E-01)
-X( 2) = ( -1.84504198504011E-01, -2.25009218431342E-01)
-X( 3) = (  3.68155873265631E-01,  7.58948020231885E-01)
-X( 4) = (  2.87888763438667E-01,  5.24782025386969E-01)
-
-X( 5) = (  2.92842868408617E-01,  7.84263738376589E-01)
-
-PATH NUMBER =      2904
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.63237982173255E-01, -5.74500977966025E-01)
-X( 2) = ( -3.02829041138537E-01, -6.11690267054618E-01)
-X( 3) = (  2.10461320445323E-01,  1.06151197570913E+00)
-X( 4) = (  2.25384770258195E-01,  4.62556639739238E-01)
-
-X( 5) = (  5.20060715351871E-01,  5.78308316264558E-01)
-
-PATH NUMBER =      2905
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.65273895337872E-01, -9.07439965310131E-01)
-X( 2) = ( -1.44917342366005E-01, -9.83962878375481E-01)
-X( 3) = ( -1.04824077171324E-01,  1.19192530782261E+00)
-X( 4) = (  2.17501640511876E-01,  3.74712436470519E-01)
-
-X( 5) = (  7.31418581457239E-01,  3.65965140985782E-01)
-
-PATH NUMBER =      2906
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.52824439457924E-01, -1.16379468621936E+00)
-X( 2) = (  2.15342258964876E-01, -1.16763656020768E+00)
-X( 3) = ( -4.30174778032600E-01,  1.08916616909370E+00)
-X( 4) = (  2.67927978219241E-01,  3.02352694569817E-01)
-
-X( 5) = (  9.83696353385364E-01,  8.14794478983011E-02)
-
-PATH NUMBER =      2907
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.25297076052338E-01, -1.22361391771491E+00)
-X( 2) = (  6.09380291551902E-01, -1.07676835551634E+00)
-X( 3) = ( -6.13355573335241E-01,  8.01316702574267E-01)
-X( 4) = (  3.53068739540695E-01,  2.79335341461424E-01)
-
-X( 5) = (  1.38771206106665E+00, -4.66226099791419E-01)
-
-PATH NUMBER =      2908
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.60239936220591E-01, -1.02682676230342E+00)
-X( 2) = (  8.59565237004427E-01, -8.87564895527125E-01)
-X( 3) = ( -6.40977137252352E-01,  2.39646198973923E-01)
-X( 4) = (  1.24385538286671E-01,  4.78872430065180E-01)
-
-X( 5) = ( -6.89743841934729E-01, -1.16508897842025E+00)
-
-PATH NUMBER =      2909
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.76024908968076E-01, -7.14662776036590E-01)
-X( 2) = (  8.38501510812294E-01, -4.83734087901227E-01)
-X( 3) = ( -3.89309762211468E-01,  9.26379625344198E-03)
-X( 4) = (  1.61837744130281E-01,  5.58722790489922E-01)
-
-X( 5) = ( -1.13012293530564E+00, -5.08785565684401E-01)
-
-PATH NUMBER =      2910
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.64066201375293E-01, -4.01106143145039E-01)
-X( 2) = (  5.62788320859794E-01, -1.87921243969293E-01)
-X( 3) = ( -4.84344140885198E-02, -5.45069270436531E-03)
-X( 4) = (  1.39200975989299E-01,  6.43965529246046E-01)
-
-X( 5) = ( -1.19448583521141E+00,  1.94757511408065E-01)
-
-PATH NUMBER =      2911
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.76750537007339E-01, -2.32873496952529E-01)
-X( 2) = (  1.61434932936490E-01, -1.38540481000631E-01)
-X( 3) = (  2.22149543322260E-01,  2.02387805017188E-01)
-X( 4) = (  6.70672292565434E-02,  6.94714621502046E-01)
-
-X( 5) = ( -9.24033801066626E-01,  8.62681940739760E-01)
-
-PATH NUMBER =      2912
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.51483891620094E-01, -2.88682762310132E-01)
-X( 2) = ( -1.77760942202257E-01, -3.58697606794328E-01)
-X( 3) = (  2.95832869142651E-01,  5.35529346466579E-01)
-X( 4) = ( -2.08113142944318E-02,  6.87224002978006E-01)
-
-X( 5) = ( -2.66240812453968E-01,  1.37924324368907E+00)
-
-PATH NUMBER =      2913
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.67052547432897E-01, -5.42420163706132E-01)
-X( 2) = ( -2.96085784836784E-01, -7.45378655417604E-01)
-X( 3) = (  1.38138316322343E-01,  8.38093301943820E-01)
-X( 4) = ( -8.33153074749037E-02,  6.24998617330275E-01)
-
-X( 5) = (  8.04641877064780E-01,  1.40494972999596E+00)
-
-PATH NUMBER =      2914
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.69088460597513E-01, -8.75359151050238E-01)
-X( 2) = ( -1.38174086064251E-01, -1.11765126673847E+00)
-X( 3) = ( -1.77147081294305E-01,  9.68506634057305E-01)
-X( 4) = ( -9.11984372212229E-02,  5.37154414061556E-01)
-
-X( 5) = (  1.75275833561343E+00,  4.11855965241022E-01)
-
-PATH NUMBER =      2915
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.56639004717565E-01, -1.13171387195946E+00)
-X( 2) = (  2.22085515266630E-01, -1.30132494857067E+00)
-X( 3) = ( -5.02497782155580E-01,  8.65747495328395E-01)
-X( 4) = ( -4.07720995138581E-02,  4.64794672160854E-01)
-
-X( 5) = (  1.41920819995387E+00, -1.04511087226112E+00)
-
-PATH NUMBER =      2916
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.70888358688020E-01, -1.19153310345502E+00)
-X( 2) = (  6.16123547853656E-01, -1.21045674387933E+00)
-X( 3) = ( -6.85678577458221E-01,  5.77898028808961E-01)
-X( 4) = (  4.43686618075966E-02,  4.41777319052462E-01)
-
-X( 5) = (  2.28000242458481E-01, -1.53447368573596E+00)
-
-PATH NUMBER =      2917
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.31630317611435E-01, -7.92089244744238E-01)
-X( 2) = (  1.23010321327070E+00, -4.82035342297432E-01)
-X( 3) = ( -8.75978348604475E-01, -4.72960649383996E-02)
-X( 4) = ( -2.83917390136931E-01,  3.71040679154992E-01)
-
-X( 5) = ( -1.17454564795917E+00, -1.22568741155765E-01)
-
-PATH NUMBER =      2918
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04741529035892E+00, -4.79925258477408E-01)
-X( 2) = (  1.20903948707856E+00, -7.82045346715347E-02)
-X( 3) = ( -6.24310973563591E-01, -2.77678467658880E-01)
-X( 4) = ( -2.46465184293320E-01,  4.50891039579734E-01)
-
-X( 5) = ( -8.06006310203780E-01,  1.45167537789773E-01)
-
-PATH NUMBER =      2919
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.35456582766137E-01, -1.66368625585858E-01)
-X( 2) = (  9.33326297126064E-01,  2.17608309260399E-01)
-X( 3) = ( -2.83435625440642E-01, -2.92392956616687E-01)
-X( 4) = ( -2.69101952434303E-01,  5.36133778335858E-01)
-
-X( 5) = ( -6.08652156425944E-01,  3.23276764186706E-01)
-
-PATH NUMBER =      2920
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.48140918398183E-01,  1.86402060665270E-03)
-X( 2) = (  5.31972909202760E-01,  2.66989072229061E-01)
-X( 3) = ( -1.28516680298627E-02, -8.45544588951338E-02)
-X( 4) = ( -3.41235699167058E-01,  5.86882870591858E-01)
-
-X( 5) = ( -4.59391316590725E-01,  4.78445564785684E-01)
-
-PATH NUMBER =      2921
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.19906489770750E-01, -5.39452447509507E-02)
-X( 2) = (  1.92777034064013E-01,  4.68319464353648E-02)
-X( 3) = (  6.08316577905284E-02,  2.48587082554258E-01)
-X( 4) = ( -4.29114242718033E-01,  5.79392252067818E-01)
-
-X( 5) = ( -3.13745812122568E-01,  6.50918435764661E-01)
-
-PATH NUMBER =      2922
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04337833957947E-01, -3.07682646146950E-01)
-X( 2) = (  7.44521914294863E-02, -3.39849102187911E-01)
-X( 3) = ( -9.68628950297793E-02,  5.51151038031499E-01)
-X( 4) = ( -4.91618235898505E-01,  5.17166866420087E-01)
-
-X( 5) = ( -1.32555487857195E-01,  9.03369394879755E-01)
-
-PATH NUMBER =      2923
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02301920793331E-01, -6.40621633491057E-01)
-X( 2) = (  2.32363890202019E-01, -7.12121713508774E-01)
-X( 3) = ( -4.12148292646428E-01,  6.81564370144984E-01)
-X( 4) = ( -4.99501365644825E-01,  4.29322663151368E-01)
-
-X( 5) = (  1.62125773825655E-01,  1.46415895923652E+00)
-
-PATH NUMBER =      2924
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.14751376673279E-01, -8.96976354400283E-01)
-X( 2) = (  5.92623491532900E-01, -8.95795395340975E-01)
-X( 3) = ( -7.37498993507704E-01,  5.78805231416073E-01)
-X( 4) = ( -4.49075027937460E-01,  3.56962921250667E-01)
-
-X( 5) = ( -2.03601527466555E-01,  4.72539734891955E+00)
-
-PATH NUMBER =      2925
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.42278740078865E-01, -9.56795585895834E-01)
-X( 2) = (  9.86661524119927E-01, -8.04927190649633E-01)
-X( 3) = ( -9.20679788810344E-01,  2.90955764896639E-01)
-X( 4) = ( -3.63934266616005E-01,  3.33945568142274E-01)
-
-X( 5) = ( -2.54440665484069E+00, -6.16488793998326E-01)
-
-PATH NUMBER =      2926
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.51468943999498E-01, -4.94832757348340E-01)
-X( 2) = (  1.36293152878661E+00, -4.98609276225378E-01)
-X( 3) = ( -6.68512664382049E-01, -1.57316565675952E-01)
-X( 4) = ( -4.97496715027212E-01,  9.52382026332613E-02)
-
-X( 5) = ( -6.84596698094153E-01,  1.94229486593301E-01)
-
-PATH NUMBER =      2927
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06725391674698E+00, -1.82668771081510E-01)
-X( 2) = (  1.34186780259448E+00, -9.47784685994806E-02)
-X( 3) = ( -4.16845289341165E-01, -3.87698968396432E-01)
-X( 4) = ( -4.60044509183601E-01,  1.75088563058003E-01)
-
-X( 5) = ( -5.03052462124470E-01,  2.02198383102066E-01)
-
-PATH NUMBER =      2928
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.55295209154201E-01,  1.30887861810040E-01)
-X( 2) = (  1.06615461264198E+00,  2.01034375332454E-01)
-X( 3) = ( -7.59699412182171E-02, -4.02413457354239E-01)
-X( 4) = ( -4.82681277324584E-01,  2.60331301814127E-01)
-
-X( 5) = ( -3.94919587327114E-01,  2.54014803798288E-01)
-
-PATH NUMBER =      2929
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.67979544786246E-01,  2.99120508002551E-01)
-X( 2) = (  6.64801224718675E-01,  2.50415138301116E-01)
-X( 3) = (  1.94614016192562E-01, -1.94574959632686E-01)
-X( 4) = ( -5.54815024057339E-01,  3.11080394070127E-01)
-
-X( 5) = ( -3.20729230619143E-01,  3.21777104909316E-01)
-
-PATH NUMBER =      2930
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.39745116158813E-01,  2.43311242644947E-01)
-X( 2) = (  3.25605349579929E-01,  3.02580125074189E-02)
-X( 3) = (  2.68297342012953E-01,  1.38566581816706E-01)
-X( 4) = ( -6.42693567608314E-01,  3.03589775546087E-01)
-
-X( 5) = ( -2.65354805159933E-01,  4.10515363638863E-01)
-
-PATH NUMBER =      2931
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24176460346010E-01, -1.04261587510522E-02)
-X( 2) = (  2.07280506945402E-01, -3.56423036115857E-01)
-X( 3) = (  1.10602789192646E-01,  4.41130537293946E-01)
-X( 4) = ( -7.05197560788786E-01,  2.41364389898356E-01)
-
-X( 5) = ( -2.33364249841759E-01,  5.42709192937849E-01)
-
-PATH NUMBER =      2932
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22140547181394E-01, -3.43365146095159E-01)
-X( 2) = (  3.65192205717935E-01, -7.28695647436720E-01)
-X( 3) = ( -2.04682608424003E-01,  5.71543869407431E-01)
-X( 4) = ( -7.13080690535105E-01,  1.53520186629637E-01)
-
-X( 5) = ( -2.89423268660646E-01,  7.62647676608270E-01)
-
-PATH NUMBER =      2933
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.34590003061342E-01, -5.99719867004385E-01)
-X( 2) = (  7.25451807048816E-01, -9.12369329268921E-01)
-X( 3) = ( -5.30033309285278E-01,  4.68784730678520E-01)
-X( 4) = ( -6.62654352827741E-01,  8.11604447289357E-02)
-
-X( 5) = ( -7.05656013883934E-01,  9.28592848956349E-01)
-
-PATH NUMBER =      2934
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.62117366466928E-01, -6.59539098499936E-01)
-X( 2) = (  1.11948983963584E+00, -8.21501124577579E-01)
-X( 3) = ( -7.13214104587919E-01,  1.80935264159086E-01)
-X( 4) = ( -5.77513591506286E-01,  5.81430916205430E-02)
-
-X( 5) = ( -9.55916952545454E-01,  4.13983598499053E-01)
-
-PATH NUMBER =      2935
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.75593426506162E-01, -2.54369053762198E-01)
-X( 2) = (  1.47533744114908E+00, -4.25925250782337E-01)
-X( 3) = ( -4.38864915159977E-01, -1.08240787641807E-01)
-X( 4) = ( -4.83825555395483E-01, -2.53324895629352E-01)
-
-X( 5) = ( -4.46790107958088E-01,  3.32869570389782E-01)
-
-PATH NUMBER =      2936
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.91378399253647E-01,  5.77949325046310E-02)
-X( 2) = (  1.45427371495695E+00, -2.20944431564398E-02)
-X( 3) = ( -1.87197540119093E-01, -3.38623190362287E-01)
-X( 4) = ( -4.46373349551872E-01, -1.73474535204609E-01)
-
-X( 5) = ( -3.50590033107584E-01,  2.68312548436386E-01)
-
-PATH NUMBER =      2937
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.79419691660863E-01,  3.71351565396182E-01)
-X( 2) = (  1.17856052500445E+00,  2.73718400775494E-01)
-X( 3) = (  1.53677808003856E-01, -3.53337679320094E-01)
-X( 4) = ( -4.69010117692855E-01, -8.82317964484859E-02)
-
-X( 5) = ( -2.71560866289403E-01,  2.66109861987638E-01)
-
-PATH NUMBER =      2938
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.92104027292910E-01,  5.39584211588693E-01)
-X( 2) = (  7.77207137081144E-01,  3.23099163744157E-01)
-X( 3) = (  4.24261765414635E-01, -1.45499181598540E-01)
-X( 4) = ( -5.41143864425610E-01, -3.74827041924857E-02)
-
-X( 5) = ( -2.11888368560116E-01,  2.90180000329786E-01)
-
-PATH NUMBER =      2939
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.63869598665476E-01,  4.83774946231089E-01)
-X( 2) = (  4.38011261942397E-01,  1.02942037950460E-01)
-X( 3) = (  4.97945091235026E-01,  1.87642359850851E-01)
-X( 4) = ( -6.29022407976585E-01, -4.49733227165260E-02)
-
-X( 5) = ( -1.65737990451475E-01,  3.32987276131081E-01)
-
-PATH NUMBER =      2940
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.16990571473264E-02,  2.30037544835089E-01)
-X( 2) = (  3.19686419307870E-01, -2.83739010672816E-01)
-X( 3) = (  3.40250538414718E-01,  4.90206315328092E-01)
-X( 4) = ( -6.91526401157057E-01, -1.07198708364257E-01)
-
-X( 5) = ( -1.34858804769123E-01,  4.00224382494645E-01)
-
-PATH NUMBER =      2941
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.37349703119431E-02, -1.02901442509017E-01)
-X( 2) = (  4.77598118080403E-01, -6.56011621993679E-01)
-X( 3) = (  2.49651407980698E-02,  6.20619647441577E-01)
-X( 4) = ( -6.99409530903376E-01, -1.95042911632976E-01)
-
-X( 5) = ( -1.43515062277533E-01,  5.04130098350187E-01)
-
-PATH NUMBER =      2942
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.58714485568005E-01, -3.59256163418243E-01)
-X( 2) = (  8.37857719411284E-01, -8.39685303825880E-01)
-X( 3) = ( -3.00385560063206E-01,  5.17860508712666E-01)
-X( 4) = ( -6.48983193196012E-01, -2.67402653533677E-01)
-
-X( 5) = ( -2.69618504018608E-01,  6.09995795254153E-01)
-
-PATH NUMBER =      2943
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.86241848973591E-01, -4.19075394913794E-01)
-X( 2) = (  1.23189575199831E+00, -7.48817099134538E-01)
-X( 3) = ( -4.83566355365846E-01,  2.30011042193232E-01)
-X( 4) = ( -5.63842431874557E-01, -2.90420006642070E-01)
-
-X( 5) = ( -4.64848320910500E-01,  5.13793934187130E-01)
-
-PATH NUMBER =      2944
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.86297874405208E-01, -1.83213773350151E-01)
-X( 2) = (  1.51472497471114E+00, -2.97992929266071E-01)
-X( 3) = ( -2.94489835049703E-01,  7.69681672053410E-02)
-X( 4) = ( -2.49300798771445E-01, -5.11552068108438E-01)
-
-X( 5) = ( -2.74544871151185E-01,  4.27519671048057E-01)
-
-PATH NUMBER =      2945
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.02082847152693E-01,  1.28950212916679E-01)
-X( 2) = (  1.49366124851901E+00,  1.05837878359826E-01)
-X( 3) = ( -4.28224600088186E-02, -1.53414235515139E-01)
-X( 4) = ( -2.11848592927835E-01, -4.31701707683696E-01)
-
-X( 5) = ( -2.42493124530588E-01,  3.34076220180616E-01)
-
-PATH NUMBER =      2946
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.90124139559910E-01,  4.42506845808229E-01)
-X( 2) = (  1.21794805856651E+00,  4.01650722291760E-01)
-X( 3) = (  2.98052888114129E-01, -1.68128724472946E-01)
-X( 4) = ( -2.34485361068817E-01, -3.46458968927573E-01)
-
-X( 5) = ( -1.84680330657843E-01,  2.97971570145101E-01)
-
-PATH NUMBER =      2947
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.02808475191956E-01,  6.10739492000740E-01)
-X( 2) = (  8.16594670643204E-01,  4.51031485260422E-01)
-X( 3) = (  5.68636845524909E-01,  3.97097732486072E-02)
-X( 4) = ( -3.06619107801573E-01, -2.95709876671572E-01)
-
-X( 5) = ( -1.31563762250675E-01,  2.94370721311652E-01)
-
-PATH NUMBER =      2948
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.25425953435478E-01,  5.54930226643136E-01)
-X( 2) = (  4.77398795504457E-01,  2.30874359466725E-01)
-X( 3) = (  6.42320171345300E-01,  3.72851314697999E-01)
-X( 4) = ( -3.94497651352548E-01, -3.03200495195613E-01)
-
-X( 5) = ( -8.54669707068960E-02,  3.10878928833477E-01)
-
-PATH NUMBER =      2949
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.40994609248280E-01,  3.01192825247137E-01)
-X( 2) = (  3.59073952869930E-01, -1.55806689156550E-01)
-X( 3) = (  4.84625618524992E-01,  6.75415270175240E-01)
-X( 4) = ( -4.57001644533019E-01, -3.65425880843344E-01)
-
-X( 5) = ( -4.67196194160321E-02,  3.47369776626901E-01)
-
-PATH NUMBER =      2950
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.43030522412897E-01, -3.17461620969696E-02)
-X( 2) = (  5.16985651642463E-01, -5.28079300477413E-01)
-X( 3) = (  1.69340220908343E-01,  8.05828602288725E-01)
-X( 4) = ( -4.64884774279339E-01, -4.53270084112063E-01)
-
-X( 5) = ( -2.49650358288841E-02,  4.11931237926751E-01)
-
-PATH NUMBER =      2951
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.30581066532949E-01, -2.88100883006196E-01)
-X( 2) = (  8.77245252973344E-01, -7.11752982309614E-01)
-X( 3) = ( -1.56010479952932E-01,  7.03069463559813E-01)
-X( 4) = ( -4.14458436571974E-01, -5.25629826012764E-01)
-
-X( 5) = ( -5.94423408363704E-02,  5.04446151287522E-01)
-
-PATH NUMBER =      2952
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.96946296872637E-01, -3.47920114501747E-01)
-X( 2) = (  1.27128328556037E+00, -6.20884777618272E-01)
-X( 3) = ( -3.39191275255573E-01,  4.15219997040379E-01)
-X( 4) = ( -3.29317675250519E-01, -5.48647179121156E-01)
-
-X( 5) = ( -1.91943817670322E-01,  5.35818353012530E-01)
-
-PATH NUMBER =      2953
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.18946891686600E-01, -3.14661262619849E-01)
-X( 2) = (  1.46266426477543E+00, -1.74673266723421E-01)
-X( 3) = ( -3.02942128585110E-01,  3.11648970524258E-01)
-X( 4) = (  9.63408147681752E-02, -5.58615950925686E-01)
-
-X( 5) = ( -1.10409129413935E-01,  5.13377209851220E-01)
-
-PATH NUMBER =      2954
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.34731864434085E-01, -2.49727635301906E-03)
-X( 2) = (  1.44160053858330E+00,  2.29157540902477E-01)
-X( 3) = ( -5.12747535442263E-02,  8.12665678037774E-02)
-X( 4) = (  1.33793020611786E-01, -4.78765590500944E-01)
-
-X( 5) = ( -1.44206659236191E-01,  4.11070826530115E-01)
-
-PATH NUMBER =      2955
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.22773156841302E-01,  3.11059356538532E-01)
-X( 2) = (  1.16588734863080E+00,  5.24970384834411E-01)
-X( 3) = (  2.89600594578722E-01,  6.65520788459707E-02)
-X( 4) = (  1.11156252470803E-01, -3.93522851744821E-01)
-
-X( 5) = ( -1.10139801669501E-01,  3.45026502600653E-01)
-
-PATH NUMBER =      2956
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.45425075266520E-02,  4.79292002731042E-01)
-X( 2) = (  7.64533960707491E-01,  5.74351147803072E-01)
-X( 3) = (  5.60184551989501E-01,  2.74390576567524E-01)
-X( 4) = (  3.90225057380481E-02, -3.42773759488820E-01)
-
-X( 5) = ( -6.28304852746574E-02,  3.16793484099362E-01)
-
-PATH NUMBER =      2957
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.92776936154085E-01,  4.23482737373438E-01)
-X( 2) = (  4.25338085568745E-01,  3.54194022009376E-01)
-X( 3) = (  6.33867877809892E-01,  6.07532118016916E-01)
-X( 4) = ( -4.88560378129269E-02, -3.50264378012860E-01)
-
-X( 5) = ( -1.55319137502737E-02,  3.12086844101034E-01)
-
-PATH NUMBER =      2958
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.08345591966888E-01,  1.69745335977439E-01)
-X( 2) = (  3.07013242934218E-01, -3.24870266138999E-02)
-X( 3) = (  4.76173324989584E-01,  9.10096073494156E-01)
-X( 4) = ( -1.11360030993399E-01, -4.12489763660591E-01)
-
-X( 5) = (  3.04727215691465E-02,  3.26833015945467E-01)
-
-PATH NUMBER =      2959
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.10381505131505E-01, -1.63193651366668E-01)
-X( 2) = (  4.64924941706751E-01, -4.04759637934763E-01)
-X( 3) = (  1.60887927372936E-01,  1.04050940560764E+00)
-X( 4) = ( -1.19243160739718E-01, -5.00333966929310E-01)
-
-X( 5) = (  7.22001653918647E-02,  3.66832478692585E-01)
-
-PATH NUMBER =      2960
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.97932049251556E-01, -4.19548372275894E-01)
-X( 2) = (  8.25184543037632E-01, -5.88433319766964E-01)
-X( 3) = ( -1.64462773488340E-01,  9.37750266878730E-01)
-X( 4) = ( -6.88168230323535E-02, -5.72693708830012E-01)
-
-X( 5) = (  8.90972746663569E-02,  4.44929886108567E-01)
-
-PATH NUMBER =      2961
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.04046858459705E-02, -4.79367603771445E-01)
-X( 2) = (  1.21922257562466E+00, -4.97565115075622E-01)
-X( 3) = ( -3.47643568790980E-01,  6.49900800359296E-01)
-X( 4) = (  1.63239382891010E-02, -5.95711061938404E-01)
-
-X( 5) = (  2.03821751755738E-02,  5.36942295578423E-01)
-
-PATH NUMBER =      2962
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.86369744395788E-02, -5.87205780465883E-01)
-X( 2) = (  1.34351509611121E+00, -1.13668903803476E-01)
-X( 3) = ( -4.60266873684203E-01,  4.85991866255418E-01)
-X( 4) = (  3.91369732869545E-01, -3.72494830254110E-01)
-
-X( 5) = (  9.23854600045878E-02,  6.13808599550056E-01)
-
-PATH NUMBER =      2963
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.14421947187064E-01, -2.75041794199054E-01)
-X( 2) = (  1.32245136991907E+00,  2.90161903822421E-01)
-X( 3) = ( -2.08599498643319E-01,  2.55609463534938E-01)
-X( 4) = (  4.28821938713155E-01, -2.92644469829368E-01)
-
-X( 5) = ( -3.31179174932060E-02,  5.24945500797344E-01)
-
-PATH NUMBER =      2964
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02463239594280E-01,  3.85148386924965E-02)
-X( 2) = (  1.04673817996657E+00,  5.85974747754355E-01)
-X( 3) = (  1.32275849479629E-01,  2.40894974577131E-01)
-X( 4) = (  4.06185170572173E-01, -2.07401731073245E-01)
-
-X( 5) = ( -3.55115821499787E-02,  4.20441502910940E-01)
-
-PATH NUMBER =      2965
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.84852424773674E-01,  2.06747484885007E-01)
-X( 2) = (  6.45384792043269E-01,  6.35355510723017E-01)
-X( 3) = (  4.02859806890409E-01,  4.48733472298684E-01)
-X( 4) = (  3.34051423839418E-01, -1.56652638817244E-01)
-
-X( 5) = (  4.93235222178273E-03,  3.61142875231977E-01)
-
-PATH NUMBER =      2966
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.13086853401106E-01,  1.50938219527403E-01)
-X( 2) = (  3.06188916904523E-01,  4.15198384929320E-01)
-X( 3) = (  4.76543132710799E-01,  7.81875013748075E-01)
-X( 4) = (  2.46172880288443E-01, -1.64143257341284E-01)
-
-X( 5) = (  5.46556308088383E-02,  3.32591634139433E-01)
-
-PATH NUMBER =      2967
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.28655509213909E-01, -1.02799181868596E-01)
-X( 2) = (  1.87864074269996E-01,  2.85173363060447E-02)
-X( 3) = (  3.18848579890492E-01,  1.08443896922532E+00)
-X( 4) = (  1.83668887107971E-01, -2.26368642989015E-01)
-
-X( 5) = (  1.08651668072645E-01,  3.25440539620960E-01)
-
-PATH NUMBER =      2968
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.30691422378526E-01, -4.35738169212702E-01)
-X( 2) = (  3.45775773042529E-01, -3.43755275014818E-01)
-X( 3) = (  3.56318227384323E-03,  1.21485230133880E+00)
-X( 4) = (  1.75785757361652E-01, -3.14212846257734E-01)
-
-X( 5) = (  1.67949904272631E-01,  3.42036597403372E-01)
-
-PATH NUMBER =      2969
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.18241966498578E-01, -6.92092890121929E-01)
-X( 2) = (  7.06035374373410E-01, -5.27428956847019E-01)
-X( 3) = ( -3.21787518587433E-01,  1.11209316260989E+00)
-X( 4) = (  2.26212095069017E-01, -3.86572588158436E-01)
-
-X( 5) = (  2.26754481776541E-01,  3.99912554959611E-01)
-
-PATH NUMBER =      2970
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.90714603092992E-01, -7.51912121617480E-01)
-X( 2) = (  1.10007340696044E+00, -4.36560752155678E-01)
-X( 3) = ( -5.04968313890073E-01,  8.24243696090457E-01)
-X( 4) = (  3.11352856390471E-01, -4.09589941266828E-01)
-
-X( 5) = (  2.34071374093099E-01,  5.23956026596223E-01)
-
-PATH NUMBER =      2971
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.81662470039817E-01, -8.73320717993178E-01)
-X( 2) = (  1.21302868893197E+00, -1.43524459904453E-01)
-X( 3) = ( -6.92850073645335E-01,  5.18419875880754E-01)
-X( 4) = (  4.97738645871841E-01, -4.02768469617869E-02)
-
-X( 5) = (  4.41431780077637E-01,  7.72646784692992E-01)
-
-PATH NUMBER =      2972
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.97447442787302E-01, -5.61156731726348E-01)
-X( 2) = (  1.19196496273984E+00,  2.60306347721444E-01)
-X( 3) = ( -4.41182698604451E-01,  2.88037473160275E-01)
-X( 4) = (  5.35190851715452E-01,  3.95735134629544E-02)
-
-X( 5) = (  1.18005620328995E-01,  7.62949349351758E-01)
-
-PATH NUMBER =      2973
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.85488735194519E-01, -2.47600098834798E-01)
-X( 2) = (  9.16251772787340E-01,  5.56119191653379E-01)
-X( 3) = ( -1.00307350481503E-01,  2.73322984202468E-01)
-X( 4) = (  5.12554083574469E-01,  1.24816252219078E-01)
-
-X( 5) = (  3.86808839093696E-02,  5.70681746200700E-01)
-
-PATH NUMBER =      2974
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.01826929173435E-01, -7.93674526422872E-02)
-X( 2) = (  5.14898384864035E-01,  6.05499954622040E-01)
-X( 3) = (  1.70276606929277E-01,  4.81161481924021E-01)
-X( 4) = (  4.40420336841714E-01,  1.75565344475078E-01)
-
-X( 5) = (  7.47833994786317E-02,  4.52510211952918E-01)
-
-PATH NUMBER =      2975
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.30061357800868E-01, -1.35176717999891E-01)
-X( 2) = (  1.75702509725289E-01,  3.85342828828344E-01)
-X( 3) = (  2.43959932749668E-01,  8.14303023373412E-01)
-X( 4) = (  3.52541793290739E-01,  1.68074725951038E-01)
-
-X( 5) = (  1.33677478268965E-01,  3.86624296959528E-01)
-
-PATH NUMBER =      2976
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.45630013613671E-01, -3.88914119395890E-01)
-X( 2) = (  5.73776670907621E-02, -1.33821979493181E-03)
-X( 3) = (  8.62653799293601E-02,  1.11686697885065E+00)
-X( 4) = (  2.90037800110267E-01,  1.05849340303307E-01)
-
-X( 5) = (  2.01734023579229E-01,  3.49144680738315E-01)
-
-PATH NUMBER =      2977
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.47665926778288E-01, -7.21853106739997E-01)
-X( 2) = (  2.15289365863295E-01, -3.73610831115795E-01)
-X( 3) = ( -2.29020017687289E-01,  1.24728031096414E+00)
-X( 4) = (  2.82154670363948E-01,  1.80051370345883E-02)
-
-X( 5) = (  2.83770946887190E-01,  3.34572599600940E-01)
-
-PATH NUMBER =      2978
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.35216470898339E-01, -9.78207827649223E-01)
-X( 2) = (  5.75548967194176E-01, -5.57284512947996E-01)
-X( 3) = ( -5.54370718548564E-01,  1.14452117223523E+00)
-X( 4) = (  3.32581008071313E-01, -5.43546048661129E-02)
-
-X( 5) = (  3.90719832680811E-01,  3.58206116493413E-01)
-
-PATH NUMBER =      2979
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07689107492754E-01, -1.03802705914477E+00)
-X( 2) = (  9.69586999781201E-01, -4.66416308256654E-01)
-X( 3) = ( -7.37551513851204E-01,  8.56671705715793E-01)
-X( 4) = (  4.17721769392767E-01, -7.73719579745057E-02)
-
-X( 5) = (  5.12737635782405E-01,  4.85433054290730E-01)
-
-PATH NUMBER =      2980
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.29174826370361E-01, -1.03912971611938E+00)
-X( 2) = (  1.13226108335177E+00, -2.50270188519158E-01)
-X( 3) = ( -8.91863464332352E-01,  3.93759573299391E-01)
-X( 4) = (  3.65676357222502E-01,  2.82589512377191E-01)
-
-X( 5) = (  1.60057156493119E+00,  1.18308458985125E+00)
-
-PATH NUMBER =      2981
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.44959799117847E-01, -7.26965729852549E-01)
-X( 2) = (  1.11119735715964E+00,  1.53560619106740E-01)
-X( 3) = ( -6.40196089291468E-01,  1.63377170578910E-01)
-X( 4) = (  4.03128563066112E-01,  3.62439872801933E-01)
-
-X( 5) = (  1.21862960191817E-01,  1.64945676806964E+00)
-
-PATH NUMBER =      2982
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.33001091525063E-01, -4.13409096960998E-01)
-X( 2) = (  8.35484167207136E-01,  4.49373463038674E-01)
-X( 3) = ( -2.99320741168520E-01,  1.48662681621103E-01)
-X( 4) = (  3.80491794925129E-01,  4.47682611558057E-01)
-
-X( 5) = ( -3.08883564394336E-02,  9.36042140956718E-01)
-
-PATH NUMBER =      2983
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.45685427157110E-01, -2.45176450768487E-01)
-X( 2) = (  4.34130779283831E-01,  4.98754226007336E-01)
-X( 3) = ( -2.87367837577406E-02,  3.56501179342657E-01)
-X( 4) = (  3.08358048192375E-01,  4.98431703814057E-01)
-
-X( 5) = (  9.12823927505539E-02,  6.65898154643685E-01)
-
-PATH NUMBER =      2984
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.82549001470324E-01, -3.00985716126091E-01)
-X( 2) = (  9.49349041450849E-02,  2.78597100213639E-01)
-X( 3) = (  4.49465420626504E-02,  6.89642720792048E-01)
-X( 4) = (  2.20479504641399E-01,  4.90941085290017E-01)
-
-X( 5) = (  2.09273490799005E-01,  5.29603904280445E-01)
-
-PATH NUMBER =      2985
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.98117657283126E-01, -5.54723117522090E-01)
-X( 2) = ( -2.33899384894418E-02, -1.08083948409637E-01)
-X( 3) = ( -1.12748010757657E-01,  9.92206676269289E-01)
-X( 4) = (  1.57975511460927E-01,  4.28715699642286E-01)
-
-X( 5) = (  3.25181895701308E-01,  4.39709932549516E-01)
-
-PATH NUMBER =      2986
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.00153570447743E-01, -8.87662104866197E-01)
-X( 2) = (  1.34521760283091E-01, -4.80356559730500E-01)
-X( 3) = ( -4.28033408374306E-01,  1.12262000838277E+00)
-X( 4) = (  1.50092381714608E-01,  3.40871496373567E-01)
-
-X( 5) = (  4.60075484737171E-01,  3.69619746314201E-01)
-
-PATH NUMBER =      2987
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.87704114567795E-01, -1.14401682577542E+00)
-X( 2) = (  4.94781361613972E-01, -6.64030241562701E-01)
-X( 3) = ( -7.53384109235582E-01,  1.01986086965386E+00)
-X( 4) = (  2.00518719421973E-01,  2.68511754472866E-01)
-
-X( 5) = (  6.55318117617298E-01,  3.16635368357794E-01)
-
-PATH NUMBER =      2988
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.39823248837790E-01, -1.20383605727097E+00)
-X( 2) = (  8.88819394200997E-01, -5.73162036871359E-01)
-X( 3) = ( -9.36564904538221E-01,  7.32011403134429E-01)
-X( 4) = (  2.85659480743428E-01,  2.45494401364473E-01)
-
-X( 5) = (  1.02505911496594E+00,  3.47442298795217E-01)
-
-PATH NUMBER =      2989
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.25360261110720E-01, -1.00704890185948E+00)
-X( 2) = (  1.13900433965352E+00, -3.83958576882143E-01)
-X( 3) = ( -9.64186468455332E-01,  1.70340899534085E-01)
-X( 4) = (  5.69762794894031E-02,  4.45031489968229E-01)
-
-X( 5) = ( -4.03445398409912E+00, -3.29319185009344E+00)
-
-PATH NUMBER =      2990
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.41145233858205E-01, -6.94884915592655E-01)
-X( 2) = (  1.11794061346139E+00,  1.98722307437540E-02)
-X( 3) = ( -7.12519093414449E-01, -6.00415031863957E-02)
-X( 4) = (  9.44284853330134E-02,  5.24881850392970E-01)
-
-X( 5) = ( -1.74198570583112E+00,  6.26904448239313E-01)
-
-PATH NUMBER =      2991
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.29186526265422E-01, -3.81328282701104E-01)
-X( 2) = (  8.42227423508890E-01,  3.15685074675688E-01)
-X( 3) = ( -3.71643745291500E-01, -7.47559921442028E-02)
-X( 4) = (  7.17917171920306E-02,  6.10124589149094E-01)
-
-X( 5) = ( -7.69147601322884E-01,  8.46458230145430E-01)
-
-PATH NUMBER =      2992
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.41870861897468E-01, -2.13095636508594E-01)
-X( 2) = (  4.40874035585585E-01,  3.65065837644350E-01)
-X( 3) = ( -1.01059787880721E-01,  1.33082505577351E-01)
-X( 4) = ( -3.42029540724359E-04,  6.60873681405094E-01)
-
-X( 5) = ( -2.84248423481231E-01,  8.54210108347180E-01)
-
-PATH NUMBER =      2993
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13636433270034E-01, -2.68904901866197E-01)
-X( 2) = (  1.01678160446838E-01,  1.44908711850654E-01)
-X( 3) = ( -2.73764620603295E-02,  4.66224047026742E-01)
-X( 4) = ( -8.82205730916995E-02,  6.53383062881054E-01)
-
-X( 5) = (  6.25401248945766E-02,  8.19545331362394E-01)
-
-PATH NUMBER =      2994
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.01932222542768E-01, -5.22642303262197E-01)
-X( 2) = ( -1.66466821876882E-02, -2.41772336772622E-01)
-X( 3) = ( -1.85071014880637E-01,  7.68788002503983E-01)
-X( 4) = ( -1.50724566272171E-01,  5.91157677233323E-01)
-
-X( 5) = (  3.84957879854164E-01,  7.56358911808979E-01)
-
-PATH NUMBER =      2995
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.03968135707385E-01, -8.55581290606304E-01)
-X( 2) = (  1.41265016584845E-01, -6.14044948093485E-01)
-X( 3) = ( -5.00356412497286E-01,  8.99201334617468E-01)
-X( 4) = ( -1.58607696018490E-01,  5.03313473964604E-01)
-
-X( 5) = (  7.67249073837301E-01,  6.40404063035204E-01)
-
-PATH NUMBER =      2996
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08481320172564E-01, -1.11193601151553E+00)
-X( 2) = (  5.01524617915726E-01, -7.97718629925686E-01)
-X( 3) = ( -8.25707113358562E-01,  7.96442195888557E-01)
-X( 4) = ( -1.08181358311126E-01,  4.30953732063903E-01)
-
-X( 5) = (  1.36891137535412E+00,  3.55441390110215E-01)
-
-PATH NUMBER =      2997
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.36008683578149E-01, -1.17175524301108E+00)
-X( 2) = (  8.95562650502751E-01, -7.06850425234344E-01)
-X( 3) = ( -1.00888790866120E+00,  5.08592729369123E-01)
-X( 4) = ( -2.30405969896711E-02,  4.07936378955510E-01)
-
-X( 5) = (  2.70594119834393E+00, -1.03686550910397E+00)
-
-PATH NUMBER =      2998
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.67460121974788E-01, -8.00312921462452E-01)
-X( 2) = (  1.43245999692667E+00, -2.62337934420858E-01)
-X( 3) = ( -1.39783751102498E+00,  3.55932262422240E-02)
-X( 4) = ( -2.17209566114921E-02,  3.69817756005322E-01)
-
-X( 5) = (  6.17202202385445E-02,  3.37919000454082E+00)
-
-PATH NUMBER =      2999
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.83245094722273E-01, -4.88148935195623E-01)
-X( 2) = (  1.41139627073453E+00,  1.41492873205039E-01)
-X( 3) = ( -1.14617013598410E+00, -1.94789176478256E-01)
-X( 4) = (  1.57312492321182E-02,  4.49668116430064E-01)
-
-X( 5) = ( -7.29220679746169E-01,  1.23601143961477E+00)
-
-PATH NUMBER =      3000
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.71286387129489E-01, -1.74592302304072E-01)
-X( 2) = (  1.13568308078204E+00,  4.37305717136973E-01)
-X( 3) = ( -8.05294787861148E-01, -2.09503665436063E-01)
-X( 4) = ( -6.90551890886421E-03,  5.34910855186187E-01)
-
-X( 5) = ( -3.28403412775944E-01,  8.05677954649495E-01)
-
-PATH NUMBER =      3001
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.83970722761536E-01, -6.35965611156175E-03)
-X( 2) = (  7.34329692858731E-01,  4.86686480105635E-01)
-X( 3) = ( -5.34710830450369E-01, -1.66516771450975E-03)
-X( 4) = ( -7.90392656416193E-02,  5.85659947442188E-01)
-
-X( 5) = ( -8.92206712615986E-02,  6.67788457239252E-01)
-
-PATH NUMBER =      3002
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.55736294134102E-01, -6.21689214691651E-02)
-X( 2) = (  3.95133817719985E-01,  2.66529354311939E-01)
-X( 3) = ( -4.61027504629978E-01,  3.31476373734882E-01)
-X( 4) = ( -1.66917809192594E-01,  5.78169328918147E-01)
-
-X( 5) = (  9.07428976741435E-02,  5.99622922563810E-01)
-
-PATH NUMBER =      3003
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.01676383212998E-02, -3.15906322865165E-01)
-X( 2) = (  2.76808975085458E-01, -1.20151694311337E-01)
-X( 3) = ( -6.18722057450285E-01,  6.34040329212123E-01)
-X( 4) = ( -2.29421802373066E-01,  5.15943943270417E-01)
-
-X( 5) = (  2.62098586071139E-01,  5.58497698411362E-01)
-
-PATH NUMBER =      3004
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.81317251566831E-02, -6.48845310209271E-01)
-X( 2) = (  4.34720673857991E-01, -4.92424305632200E-01)
-X( 3) = ( -9.34007455066935E-01,  7.64453661325608E-01)
-X( 4) = ( -2.37304932119386E-01,  4.28099740001698E-01)
-
-X( 5) = (  4.67957159916531E-01,  5.37007660002272E-01)
-
-PATH NUMBER =      3005
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.50581181036631E-01, -9.05200031118497E-01)
-X( 2) = (  7.94980275188871E-01, -6.76097987464401E-01)
-X( 3) = ( -1.25935815592821E+00,  6.61694522596696E-01)
-X( 4) = ( -1.86878594412021E-01,  3.55739998100996E-01)
-
-X( 5) = (  7.93239862013949E-01,  5.62820128605292E-01)
-
-PATH NUMBER =      3006
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.78108544442217E-01, -9.65019262614048E-01)
-X( 2) = (  1.18901830777590E+00, -5.85229782773059E-01)
-X( 3) = ( -1.44253895123085E+00,  3.73845056077263E-01)
-X( 4) = ( -1.01737833090566E-01,  3.32722644992604E-01)
-
-X( 5) = (  1.52078119702286E+00,  9.37800161988401E-01)
-
-PATH NUMBER =      3007
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.87298748362851E-01, -5.03056434066554E-01)
-X( 2) = (  1.56528831244259E+00, -2.78911868348804E-01)
-X( 3) = ( -1.19037182680256E+00, -7.44272744953281E-02)
-X( 4) = ( -2.35300281501772E-01,  9.40152794835908E-02)
-
-X( 5) = ( -5.98190492550133E-01,  9.10174285197890E-01)
-
-PATH NUMBER =      3008
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00308372111034E+00, -1.90892447799725E-01)
-X( 2) = (  1.54422458625045E+00,  1.24918939277093E-01)
-X( 3) = ( -9.38704451761672E-01, -3.04809677215808E-01)
-X( 4) = ( -1.97848075658162E-01,  1.73865639908333E-01)
-
-X( 5) = ( -4.55953951718943E-01,  5.65669175399349E-01)
-
-PATH NUMBER =      3009
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.91125013517553E-01,  1.22664185091826E-01)
-X( 2) = (  1.26851139629795E+00,  4.20731783209028E-01)
-X( 3) = ( -5.97829103638723E-01, -3.19524166173615E-01)
-X( 4) = ( -2.20484843799145E-01,  2.59108378664456E-01)
-
-X( 5) = ( -2.90412561517621E-01,  4.72714385864349E-01)
-
-PATH NUMBER =      3010
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.03809349149599E-01,  2.90896831284336E-01)
-X( 2) = (  8.67158008374647E-01,  4.70112546177689E-01)
-X( 3) = ( -3.27245146227944E-01, -1.11685668452062E-01)
-X( 4) = ( -2.92618590531900E-01,  3.09857470920457E-01)
-
-X( 5) = ( -1.65290945949179E-01,  4.54668301674270E-01)
-
-PATH NUMBER =      3011
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.75574920522165E-01,  2.35087565926733E-01)
-X( 2) = (  5.27962133235900E-01,  2.49955420383993E-01)
-X( 3) = ( -2.53561820407553E-01,  2.21455872997330E-01)
-X( 4) = ( -3.80497134082875E-01,  3.02366852396416E-01)
-
-X( 5) = ( -5.86041761622627E-02,  4.68447286417502E-01)
-
-PATH NUMBER =      3012
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.00062647093628E-02, -1.86498354692666E-02)
-X( 2) = (  4.09637290601373E-01, -1.36725628239283E-01)
-X( 3) = ( -4.11256373227860E-01,  5.24019828474570E-01)
-X( 4) = ( -4.43001127263347E-01,  2.40141466748686E-01)
-
-X( 5) = (  4.72030171204057E-02,  5.11427552171387E-01)
-
-PATH NUMBER =      3013
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.79703515447459E-02, -3.51588822813373E-01)
-X( 2) = (  5.67548989373906E-01, -5.08998239560146E-01)
-X( 3) = ( -7.26541770844509E-01,  6.54433160588056E-01)
-X( 4) = ( -4.50884257009666E-01,  1.52297263479966E-01)
-
-X( 5) = (  1.64354494922161E-01,  6.09316576944744E-01)
-
-PATH NUMBER =      3014
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.70419807424694E-01, -6.07943543722599E-01)
-X( 2) = (  9.27808590704787E-01, -6.92671921392347E-01)
-X( 3) = ( -1.05189247170578E+00,  5.51674021859144E-01)
-X( 4) = ( -4.00457919302301E-01,  7.99375215792649E-02)
-
-X( 5) = (  2.64066165838286E-01,  8.56311099920598E-01)
-
-PATH NUMBER =      3015
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.97947170830280E-01, -6.67762775218151E-01)
-X( 2) = (  1.32184662329181E+00, -6.01803716701005E-01)
-X( 3) = ( -1.23507326700843E+00,  2.63824555339710E-01)
-X( 4) = ( -3.15317157980847E-01,  5.69201684708724E-02)
-
-X( 5) = ( -5.67194797886981E-02,  1.30435564862146E+00)
-
-PATH NUMBER =      3016
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.11423230869514E-01, -2.62592730480413E-01)
-X( 2) = (  1.67769422480505E+00, -2.06227842905763E-01)
-X( 3) = ( -9.60724077580482E-01, -2.53514964611821E-02)
-X( 4) = ( -2.21629121870044E-01, -2.54547818779022E-01)
-
-X( 5) = ( -2.39533091600018E-01,  5.89464325679495E-01)
-
-PATH NUMBER =      3017
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.27208203616999E-01,  4.95712557864163E-02)
-X( 2) = (  1.65663049861292E+00,  1.97602964720134E-01)
-X( 3) = ( -7.09056702539599E-01, -2.55733899181662E-01)
-X( 4) = ( -1.84176916026433E-01, -1.74697458354280E-01)
-
-X( 5) = ( -2.37577999491471E-01,  4.39700609701833E-01)
-
-PATH NUMBER =      3018
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.15249496024216E-01,  3.63127888677967E-01)
-X( 2) = (  1.38091730866042E+00,  4.93415808652068E-01)
-X( 3) = ( -3.68181354416650E-01, -2.70448388139470E-01)
-X( 4) = ( -2.06813684167416E-01, -8.94547195981568E-02)
-
-X( 5) = ( -1.71492933828997E-01,  3.70055163681992E-01)
-
-PATH NUMBER =      3019
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.27933831656262E-01,  5.31360534870478E-01)
-X( 2) = (  9.79563920737115E-01,  5.42796571620730E-01)
-X( 3) = ( -9.75973970058709E-02, -6.26098904179163E-02)
-X( 4) = ( -2.78947430900171E-01, -3.87056273421560E-02)
-
-X( 5) = ( -1.05058673230386E-01,  3.48337983091204E-01)
-
-PATH NUMBER =      3020
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.96994030288282E-02,  4.75551269512874E-01)
-X( 2) = (  6.40368045598369E-01,  3.22639445827034E-01)
-X( 3) = ( -2.39140711854799E-02,  2.70531651031475E-01)
-X( 4) = ( -3.66825974451146E-01, -4.61962458661964E-02)
-
-X( 5) = ( -4.42905988765400E-02,  3.52788873496092E-01)
-
-PATH NUMBER =      3021
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.15869252783974E-01,  2.21813868116875E-01)
-X( 2) = (  5.22043202963842E-01, -6.40416027962419E-02)
-X( 3) = ( -1.81608624005787E-01,  5.73095606508716E-01)
-X( 4) = ( -4.29329967631618E-01, -1.08421631513927E-01)
-
-X( 5) = (  1.32439407187286E-02,  3.80120990813743E-01)
-
-PATH NUMBER =      3022
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.17905165948591E-01, -1.11125119227232E-01)
-X( 2) = (  6.79954901736374E-01, -4.36314214117105E-01)
-X( 3) = ( -4.96894021622436E-01,  7.03508938622201E-01)
-X( 4) = ( -4.37213097377937E-01, -1.96265834782646E-01)
-
-X( 5) = (  6.46892383808408E-02,  4.41244790023475E-01)
-
-PATH NUMBER =      3023
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.45442899313573E-02, -3.67479840136458E-01)
-X( 2) = (  1.04021450306726E+00, -6.19987895949306E-01)
-X( 3) = ( -8.22244722483712E-01,  6.00749799893290E-01)
-X( 4) = ( -3.86786759670573E-01, -2.68625576683348E-01)
-
-X( 5) = (  7.69242835962032E-02,  5.59170531689318E-01)
-
-PATH NUMBER =      3024
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.22071653336943E-01, -4.27299071632009E-01)
-X( 2) = (  1.43425253565428E+00, -5.29119691257964E-01)
-X( 3) = ( -1.00542551778635E+00,  3.12900333373856E-01)
-X( 4) = ( -3.01645998349118E-01, -2.91642929791741E-01)
-
-X( 5) = ( -5.66908108062942E-02,  6.83066324999034E-01)
-
-PATH NUMBER =      3025
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.22127678768560E-01, -1.91437450068365E-01)
-X( 2) = (  1.71708175836711E+00, -7.82955213894973E-02)
-X( 3) = ( -8.16348997470209E-01,  1.59857458385965E-01)
-X( 4) = (  1.28956347539939E-02, -5.12774991258109E-01)
-
-X( 5) = ( -5.13115819736886E-02,  4.84807895512377E-01)
-
-PATH NUMBER =      3026
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.37912651516045E-01,  1.20726536198465E-01)
-X( 2) = (  1.69601803217498E+00,  3.25535286236400E-01)
-X( 3) = ( -5.64681622429325E-01, -7.05249443345153E-02)
-X( 4) = (  5.03478405976044E-02, -4.32924630833367E-01)
-
-X( 5) = ( -9.87584212056910E-02,  4.02353887072884E-01)
-
-PATH NUMBER =      3027
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.25953943923262E-01,  4.34283169090015E-01)
-X( 2) = (  1.42030484222248E+00,  6.21348130168334E-01)
-X( 3) = ( -2.23806274306377E-01, -8.52394332923220E-02)
-X( 4) = (  2.77110724566217E-02, -3.47681892077244E-01)
-
-X( 5) = ( -7.87803703582176E-02,  3.37703582242612E-01)
-
-PATH NUMBER =      3028
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.38638279555308E-01,  6.02515815282525E-01)
-X( 2) = (  1.01895145429918E+00,  6.70728893136996E-01)
-X( 3) = (  4.67776831044030E-02,  1.22599064429231E-01)
-X( 4) = ( -4.44226742761335E-02, -2.96932799821243E-01)
-
-X( 5) = ( -3.97500484811532E-02,  3.05855558186099E-01)
-
-PATH NUMBER =      3029
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.89596149072125E-01,  5.46706549924922E-01)
-X( 2) = (  6.79755579160429E-01,  4.50571767343299E-01)
-X( 3) = (  1.20461008924794E-01,  4.55740605878623E-01)
-X( 4) = ( -1.32301217827109E-01, -3.04423418345283E-01)
-
-X( 5) = (  2.23360552381846E-03,  2.96334879488230E-01)
-
-PATH NUMBER =      3030
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.05164804884928E-01,  2.92969148528922E-01)
-X( 2) = (  5.61430736525902E-01,  6.38907187200235E-02)
-X( 3) = ( -3.72335438955136E-02,  7.58304561355863E-01)
-X( 4) = ( -1.94805211007581E-01, -3.66648803993014E-01)
-
-X( 5) = (  4.43752433531142E-02,  3.04938209982735E-01)
-
-PATH NUMBER =      3031
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.07200718049545E-01, -3.99698388151841E-02)
-X( 2) = (  7.19342435298435E-01, -3.08381892600840E-01)
-X( 3) = ( -3.52518941512163E-01,  8.88717893469349E-01)
-X( 4) = ( -2.02688340753900E-01, -4.54493007261733E-01)
-
-X( 5) = (  8.40066700355124E-02,  3.35819116920115E-01)
-
-PATH NUMBER =      3032
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.94751262169596E-01, -2.96324559724410E-01)
-X( 2) = (  1.07960203662932E+00, -4.92055574433040E-01)
-X( 3) = ( -6.77869642373437E-01,  7.85958754740437E-01)
-X( 4) = ( -1.52262003046535E-01, -5.26852749162434E-01)
-
-X( 5) = (  1.05479729627909E-01,  3.99708440624281E-01)
-
-PATH NUMBER =      3033
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.32776101235989E-01, -3.56143791219961E-01)
-X( 2) = (  1.47364006921634E+00, -4.01187369741699E-01)
-X( 3) = ( -8.61050437676078E-01,  4.98109288221003E-01)
-X( 4) = ( -6.71212417250805E-02, -5.49870102270827E-01)
-
-X( 5) = (  6.04856577067721E-02,  4.83161172843952E-01)
-
-PATH NUMBER =      3034
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.54776696049952E-01, -3.22884939338063E-01)
-X( 2) = (  1.66502104843140E+00,  4.50241411531530E-02)
-X( 3) = ( -8.24801291005616E-01,  3.94538261704882E-01)
-X( 4) = (  3.58537248293614E-01, -5.59838874075356E-01)
-
-X( 5) = (  8.53114258322108E-02,  4.28345451893077E-01)
-
-PATH NUMBER =      3035
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.70561668797437E-01, -1.07209530712339E-02)
-X( 2) = (  1.64395732223927E+00,  4.48854948779050E-01)
-X( 3) = ( -5.73133915964732E-01,  1.64155858984402E-01)
-X( 4) = (  3.95989454137225E-01, -4.79988513650615E-01)
-
-X( 5) = (  1.34794810351391E-02,  3.91721047837733E-01)
-
-PATH NUMBER =      3036
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.58602961204654E-01,  3.02835679820317E-01)
-X( 2) = (  1.36824413228677E+00,  7.44667792710984E-01)
-X( 3) = ( -2.32258567841784E-01,  1.49441370026595E-01)
-X( 4) = (  3.73352685996242E-01, -3.94745774894491E-01)
-
-X( 5) = (  8.78271796237672E-04,  3.31781061723719E-01)
-
-PATH NUMBER =      3037
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.28712703163300E-01,  4.71068326012827E-01)
-X( 2) = (  9.66890744363463E-01,  7.94048555679647E-01)
-X( 3) = (  3.83253895689950E-02,  3.57279867748148E-01)
-X( 4) = (  3.01218939263487E-01, -3.43996682638490E-01)
-
-X( 5) = (  2.08505776021801E-02,  2.90827510075479E-01)
-
-PATH NUMBER =      3038
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.56947131790733E-01,  4.15259060655223E-01)
-X( 2) = (  6.27694869224717E-01,  5.73891429885950E-01)
-X( 3) = (  1.12008715389386E-01,  6.90421409197539E-01)
-X( 4) = (  2.13340395712512E-01, -3.51487301162531E-01)
-
-X( 5) = (  5.18066245636795E-02,  2.69362569554473E-01)
-
-PATH NUMBER =      3039
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.72515787603536E-01,  1.61521659259224E-01)
-X( 2) = (  5.09370026590190E-01,  1.87210381262674E-01)
-X( 3) = ( -4.56858374309215E-02,  9.92985364674780E-01)
-X( 4) = (  1.50836402532040E-01, -4.13712686810262E-01)
-
-X( 5) = (  8.72662639972253E-02,  2.63782929222986E-01)
-
-PATH NUMBER =      3040
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.74551700768152E-01, -1.71417328084882E-01)
-X( 2) = (  6.67281725362722E-01, -1.85062230058189E-01)
-X( 3) = ( -3.60971235047570E-01,  1.12339869678827E+00)
-X( 4) = (  1.42953272785721E-01, -5.01556890078981E-01)
-
-X( 5) = (  1.25042238064074E-01,  2.75730235908487E-01)
-
-PATH NUMBER =      3041
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.62102244888204E-01, -4.27772048994108E-01)
-X( 2) = (  1.02754132669360E+00, -3.68735911890390E-01)
-X( 3) = ( -6.86321935908845E-01,  1.02063955805935E+00)
-X( 4) = (  1.93379610493086E-01, -5.73916631979682E-01)
-
-X( 5) = (  1.57787923479853E-01,  3.13594769454834E-01)
-
-PATH NUMBER =      3042
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.34574881482618E-01, -4.87591280489659E-01)
-X( 2) = (  1.42157935928063E+00, -2.77867707199048E-01)
-X( 3) = ( -8.69502731211486E-01,  7.32790091539921E-01)
-X( 4) = (  2.78520371814540E-01, -5.96933985088075E-01)
-
-X( 5) = (  1.56262358146244E-01,  3.81787767156849E-01)
-
-PATH NUMBER =      3043
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.44667788029313E-02, -5.95429457184098E-01)
-X( 2) = (  1.54587187976718E+00,  1.06028504073097E-01)
-X( 3) = ( -9.82126036104709E-01,  5.68881157436042E-01)
-X( 4) = (  6.53566166394984E-01, -3.73717753403780E-01)
-
-X( 5) = (  2.13627004679582E-01,  3.88355162058711E-01)
-
-PATH NUMBER =      3044
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.50251751550416E-01, -2.83265470917269E-01)
-X( 2) = (  1.52480815357505E+00,  5.09859311698995E-01)
-X( 3) = ( -7.30458661063826E-01,  3.38498754715562E-01)
-X( 4) = (  6.91018372238594E-01, -2.93867392979039E-01)
-
-X( 5) = (  1.26961182616969E-01,  3.97865726704483E-01)
-
-PATH NUMBER =      3045
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.82930439576330E-02,  3.02911619742819E-02)
-X( 2) = (  1.24909496362255E+00,  8.05672155630928E-01)
-X( 3) = ( -3.89583312940877E-01,  3.23784265757755E-01)
-X( 4) = (  6.68381604097612E-01, -2.08624654222915E-01)
-
-X( 5) = (  8.14584065108382E-02,  3.45023781523623E-01)
-
-PATH NUMBER =      3046
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.49022620410321E-01,  1.98523808166793E-01)
-X( 2) = (  8.47741575699241E-01,  8.55052918599591E-01)
-X( 3) = ( -1.18999355530098E-01,  5.31622763479308E-01)
-X( 4) = (  5.96247857364857E-01, -1.57875561966915E-01)
-
-X( 5) = (  8.25942788267708E-02,  2.94039382172546E-01)
-
-PATH NUMBER =      3047
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.77257049037754E-01,  1.42714542809189E-01)
-X( 2) = (  5.08545700560495E-01,  6.34895792805894E-01)
-X( 3) = ( -4.53160297097065E-02,  8.64764304928699E-01)
-X( 4) = (  5.08369313813882E-01, -1.65366180490955E-01)
-
-X( 5) = (  1.04373285158399E-01,  2.60110383955497E-01)
-
-PATH NUMBER =      3048
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.92825704850557E-01, -1.11022858586811E-01)
-X( 2) = (  3.90220857925968E-01,  2.48214744182619E-01)
-X( 3) = ( -2.03010582530014E-01,  1.16732826040594E+00)
-X( 4) = (  4.45865320633410E-01, -2.27591566138686E-01)
-
-X( 5) = (  1.35710184890221E-01,  2.41305690560775E-01)
-
-PATH NUMBER =      3049
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.94861618015174E-01, -4.43961845930917E-01)
-X( 2) = (  5.48132556698500E-01, -1.24057867138245E-01)
-X( 3) = ( -5.18295980146663E-01,  1.29774159251943E+00)
-X( 4) = (  4.37982190887090E-01, -3.15435769407405E-01)
-
-X( 5) = (  1.73961751040132E-01,  2.37760537376068E-01)
-
-PATH NUMBER =      3050
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.82412162135225E-01, -7.00316566840143E-01)
-X( 2) = (  9.08392158029381E-01, -3.07731548970445E-01)
-X( 3) = ( -8.43646681007938E-01,  1.19498245379051E+00)
-X( 4) = (  4.88408528594455E-01, -3.87795511308106E-01)
-
-X( 5) = (  2.16562152678354E-01,  2.56637719339946E-01)
-
-PATH NUMBER =      3051
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.54884798729639E-01, -7.60135798335694E-01)
-X( 2) = (  1.30243019061641E+00, -2.16863344279104E-01)
-X( 3) = ( -1.02682747631058E+00,  9.07132987271080E-01)
-X( 4) = (  5.73549289915910E-01, -4.10812864416499E-01)
-
-X( 5) = (  2.46261304804729E-01,  3.12053615780510E-01)
-
-PATH NUMBER =      3052
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17492274403169E-01, -8.81544394711392E-01)
-X( 2) = (  1.41538547258794E+00,  7.61729479721215E-02)
-X( 3) = ( -1.21470923606584E+00,  6.01309167061379E-01)
-X( 4) = (  7.59935079397281E-01, -4.14997701114579E-02)
-
-X( 5) = (  3.67588892450565E-01,  3.55653521384997E-01)
-
-PATH NUMBER =      3053
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.33277247150654E-01, -5.69380408444563E-01)
-X( 2) = (  1.39432174639581E+00,  4.80003755598018E-01)
-X( 3) = ( -9.63041861024957E-01,  3.70926764340899E-01)
-X( 4) = (  7.97387285240891E-01,  3.83505903132840E-02)
-
-X( 5) = (  2.70776771496170E-01,  4.30864304295992E-01)
-
-PATH NUMBER =      3054
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21318539557871E-01, -2.55823775553012E-01)
-X( 2) = (  1.11860855644331E+00,  7.75816599529952E-01)
-X( 3) = ( -6.22166512902009E-01,  3.56212275383092E-01)
-X( 4) = (  7.74750517099908E-01,  1.23593329069407E-01)
-
-X( 5) = (  1.76855871930999E-01,  3.89654545379724E-01)
-
-PATH NUMBER =      3055
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.65997124810083E-01, -8.75911293605016E-02)
-X( 2) = (  7.17255168520007E-01,  8.25197362498614E-01)
-X( 3) = ( -3.51582555491229E-01,  5.64050773104645E-01)
-X( 4) = (  7.02616770367153E-01,  1.74342421325408E-01)
-
-X( 5) = (  1.52816270356809E-01,  3.21967048473168E-01)
-
-PATH NUMBER =      3056
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.94231553437516E-01, -1.43400394718105E-01)
-X( 2) = (  3.78059293381260E-01,  6.05040236704918E-01)
-X( 3) = ( -2.77899229670838E-01,  8.97192314554036E-01)
-X( 4) = (  6.14738226816178E-01,  1.66851802801367E-01)
-
-X( 5) = (  1.65163342869319E-01,  2.70254468867226E-01)
-
-PATH NUMBER =      3057
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.09800209250319E-01, -3.97137796114104E-01)
-X( 2) = (  2.59734450746733E-01,  2.18359188081642E-01)
-X( 3) = ( -4.35593782491145E-01,  1.19975627003128E+00)
-X( 4) = (  5.52234233635706E-01,  1.04626417153636E-01)
-
-X( 5) = (  1.93954809811291E-01,  2.35069978008320E-01)
-
-PATH NUMBER =      3058
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.11836122414936E-01, -7.30076783458211E-01)
-X( 2) = (  4.17646149519266E-01, -1.53913423239221E-01)
-X( 3) = ( -7.50879180107795E-01,  1.33016960214476E+00)
-X( 4) = (  5.44351103889387E-01,  1.67822138849176E-02)
-
-X( 5) = (  2.34666189197703E-01,  2.14458857319711E-01)
-
-PATH NUMBER =      3059
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.99386666534988E-01, -9.86431504367437E-01)
-X( 2) = (  7.77905750850147E-01, -3.37587105071422E-01)
-X( 3) = ( -1.07622988096907E+00,  1.22741046341585E+00)
-X( 4) = (  5.94777441596752E-01, -5.55775280157841E-02)
-
-X( 5) = (  2.88409577511754E-01,  2.13721171235799E-01)
-
-PATH NUMBER =      3060
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.71859303129402E-01, -1.04625073586299E+00)
-X( 2) = (  1.17194378343717E+00, -2.46718900380080E-01)
-X( 3) = ( -1.25941067627171E+00,  9.39560996896417E-01)
-X( 4) = (  6.79918202918206E-01, -7.85948811241763E-02)
-
-X( 5) = (  3.49866537376248E-01,  2.53140727920380E-01)
-
-PATH NUMBER =      3061
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.65004630733714E-01, -1.04735339283759E+00)
-X( 2) = (  1.33461786700774E+00, -3.05727806425828E-02)
-X( 3) = ( -1.41372262675286E+00,  4.76648864480014E-01)
-X( 4) = (  6.27872790747941E-01,  2.81366589227521E-01)
-
-X( 5) = (  6.15893109187406E-01,  3.35766082502824E-01)
-
-PATH NUMBER =      3062
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.80789603481199E-01, -7.35189406570763E-01)
-X( 2) = (  1.31355414081561E+00,  3.73258026983313E-01)
-X( 3) = ( -1.16205525171197E+00,  2.46266461759534E-01)
-X( 4) = (  6.65324996591551E-01,  3.61216949652263E-01)
-
-X( 5) = (  5.04187272018570E-01,  5.57600485884230E-01)
-
-PATH NUMBER =      3063
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.68830895888416E-01, -4.21632773679212E-01)
-X( 2) = (  1.03784095086311E+00,  6.69070870915248E-01)
-X( 3) = ( -8.21179903589026E-01,  2.31551972801727E-01)
-X( 4) = (  6.42688228450569E-01,  4.46459688408386E-01)
-
-X( 5) = (  2.93810708254177E-01,  5.24717798370201E-01)
-
-PATH NUMBER =      3064
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.15152315204616E-02, -2.53400127486702E-01)
-X( 2) = (  6.36487562939803E-01,  7.18451633883910E-01)
-X( 3) = ( -5.50595946178247E-01,  4.39390470523281E-01)
-X( 4) = (  5.70554481717813E-01,  4.97208780664387E-01)
-
-X( 5) = (  2.30544230619974E-01,  4.08020438815261E-01)
-
-PATH NUMBER =      3065
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.46719197106972E-01, -3.09209392844305E-01)
-X( 2) = (  2.97291687801056E-01,  4.98294508090213E-01)
-X( 3) = ( -4.76912620357856E-01,  7.72532011972672E-01)
-X( 4) = (  4.82675938166838E-01,  4.89718162140346E-01)
-
-X( 5) = (  2.37097139258260E-01,  3.20301072080662E-01)
-
-PATH NUMBER =      3066
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.62287852919774E-01, -5.62946794240305E-01)
-X( 2) = (  1.78966845166530E-01,  1.11613459466938E-01)
-X( 3) = ( -6.34607173178163E-01,  1.07509596744991E+00)
-X( 4) = (  4.20171944986366E-01,  4.27492776492615E-01)
-
-X( 5) = (  2.69457113453140E-01,  2.58179386740902E-01)
-
-PATH NUMBER =      3067
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.64323766084391E-01, -8.95885781584411E-01)
-X( 2) = (  3.36878543939063E-01, -2.60659151853926E-01)
-X( 3) = ( -9.49892570794812E-01,  1.20550929956340E+00)
-X( 4) = (  4.12288815240047E-01,  3.39648573223896E-01)
-
-X( 5) = (  3.19346750887532E-01,  2.12786191521702E-01)
-
-PATH NUMBER =      3068
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.51874310204443E-01, -1.15224050249364E+00)
-X( 2) = (  6.97138145269943E-01, -4.44332833686127E-01)
-X( 3) = ( -1.27524327165609E+00,  1.10275016083449E+00)
-X( 4) = (  4.62715152947412E-01,  2.67288831323195E-01)
-
-X( 5) = (  3.92642870421212E-01,  1.84850877183906E-01)
-
-PATH NUMBER =      3069
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.56530532011434E-02, -1.21205973398919E+00)
-X( 2) = (  1.09117617785697E+00, -3.53464628994785E-01)
-X( 3) = ( -1.45842406695873E+00,  8.14900694315053E-01)
-X( 4) = (  5.47855914268867E-01,  2.44271478214803E-01)
-
-X( 5) = (  5.02180245778177E-01,  1.98320776117415E-01)
-
-PATH NUMBER =      3070
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.61190065474072E-01, -1.01527257857770E+00)
-X( 2) = (  1.34136112330949E+00, -1.64261169005569E-01)
-X( 3) = ( -1.48604563087584E+00,  2.53230190714709E-01)
-X( 4) = (  3.19172713014842E-01,  4.43808566818558E-01)
-
-X( 5) = (  1.25420666130562E+00,  4.70723593214718E-01)
-
-PATH NUMBER =      3071
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.76975038221557E-01, -7.03108592310870E-01)
-X( 2) = (  1.32029739711736E+00,  2.39569638620328E-01)
-X( 3) = ( -1.23437825583495E+00,  2.28477879942284E-02)
-X( 4) = (  3.56624918858452E-01,  5.23658927243299E-01)
-
-X( 5) = (  7.77977403983852E-01,  1.29885770548259E+00)
-
-PATH NUMBER =      3072
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.65016330628774E-01, -3.89551959419319E-01)
-X( 2) = (  1.04458420716486E+00,  5.35382482552262E-01)
-X( 3) = ( -8.93502907712006E-01,  8.13329903642143E-03)
-X( 4) = (  3.33988150717470E-01,  6.08901665999423E-01)
-
-X( 5) = (  2.29759535018802E-01,  9.12233610429972E-01)
-
-PATH NUMBER =      3073
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.77700666260820E-01, -2.21319313226808E-01)
-X( 2) = (  6.43230819241557E-01,  5.84763245520924E-01)
-X( 3) = ( -6.22918950301227E-01,  2.15971796757975E-01)
-X( 4) = (  2.61854403984715E-01,  6.59650758255424E-01)
-
-X( 5) = (  2.14752084467330E-01,  6.21337899826159E-01)
-
-PATH NUMBER =      3074
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.94662376333867E-02, -2.77128578584412E-01)
-X( 2) = (  3.04034944102810E-01,  3.64606119727228E-01)
-X( 3) = ( -5.49235624480836E-01,  5.49113338207366E-01)
-X( 4) = (  1.73975860433740E-01,  6.52160139731383E-01)
-
-X( 5) = (  2.73800434873007E-01,  4.65025465906506E-01)
-
-PATH NUMBER =      3075
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.66102418179416E-01, -5.30865979980411E-01)
-X( 2) = (  1.85710101468283E-01, -2.20749288960481E-02)
-X( 3) = ( -7.06930177301143E-01,  8.51677293684607E-01)
-X( 4) = (  1.11471867253268E-01,  5.89934754083653E-01)
-
-X( 5) = (  3.48482924362940E-01,  3.61527580750760E-01)
-
-PATH NUMBER =      3076
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.68138331344032E-01, -8.63804967324518E-01)
-X( 2) = (  3.43621800240816E-01, -3.94347540216911E-01)
-X( 3) = ( -1.02221557491779E+00,  9.82090625798092E-01)
-X( 4) = (  1.03588737506948E-01,  5.02090550814934E-01)
-
-X( 5) = (  4.41326525679551E-01,  2.79932223956841E-01)
-
-PATH NUMBER =      3077
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.43111245359158E-02, -1.12015968823374E+00)
-X( 2) = (  7.03881401571697E-01, -5.78021222049113E-01)
-X( 3) = ( -1.34756627577907E+00,  8.79331487069181E-01)
-X( 4) = (  1.54015075214313E-01,  4.29730808914232E-01)
-
-X( 5) = (  5.75463139752927E-01,  2.10885514639595E-01)
-
-PATH NUMBER =      3078
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.71838487941502E-01, -1.17997891972930E+00)
-X( 2) = (  1.09791943415872E+00, -4.87153017357771E-01)
-X( 3) = ( -1.53074707108171E+00,  5.91482020549747E-01)
-X( 4) = (  2.39155836535767E-01,  4.06713455805839E-01)
-
-X( 5) = (  8.14491653302896E-01,  1.81187190159623E-01)
-
-PATH NUMBER =      3079
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.23588977694012E-01, -8.47860429980846E-01)
-X( 2) = (  1.44625551491044E+00,  3.60324773207115E-02)
-X( 3) = ( -1.85088503183454E+00, -2.36354496460082E-01)
-X( 4) = (  1.79919244144492E-01,  5.37417561296307E-01)
-
-X( 5) = (  1.10667015349653E+00,  5.51679956691157E-02)
-
-PATH NUMBER =      3080
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.39373950441497E-01, -5.35696443714016E-01)
-X( 2) = (  1.42519178871831E+00,  4.39863284946610E-01)
-X( 3) = ( -1.59921765679365E+00, -4.66736899180563E-01)
-X( 4) = (  2.17371449988102E-01,  6.17267921721049E-01)
-
-X( 5) = (  1.30379181826688E+00,  8.40319596800395E-01)
-
-PATH NUMBER =      3081
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.27415242848714E-01, -2.22139810822466E-01)
-X( 2) = (  1.14947859876581E+00,  7.35676128878544E-01)
-X( 3) = ( -1.25834230867071E+00, -4.81451388138370E-01)
-X( 4) = (  1.94734681847120E-01,  7.02510660477172E-01)
-
-X( 5) = (  5.27981257393871E-01,  9.29375839492940E-01)
-
-PATH NUMBER =      3082
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.40099578480760E-01, -5.39071646299553E-02)
-X( 2) = (  7.48125210842506E-01,  7.85056891847206E-01)
-X( 3) = ( -9.87758351259927E-01, -2.73612890416817E-01)
-X( 4) = (  1.22600935114365E-01,  7.53259752733173E-01)
-
-X( 5) = (  3.53528937916332E-01,  6.16837599895675E-01)
-
-PATH NUMBER =      3083
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.11865149853327E-01, -1.09716429987559E-01)
-X( 2) = (  4.08929335703760E-01,  5.64899766053510E-01)
-X( 3) = ( -9.14075025439536E-01,  5.95286510325736E-02)
-X( 4) = (  3.47223915633897E-02,  7.45769134209133E-01)
-
-X( 5) = (  3.56122351113056E-01,  4.29915316210252E-01)
-
-PATH NUMBER =      3084
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.70350595947607E-03, -3.63453831383558E-01)
-X( 2) = (  2.90604493069232E-01,  1.78218717430234E-01)
-X( 3) = ( -1.07176957825984E+00,  3.62092606509815E-01)
-X( 4) = ( -2.77816016170825E-02,  6.83543748561402E-01)
-
-X( 5) = (  3.97071319094528E-01,  3.04824444480667E-01)
-
-PATH NUMBER =      3085
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.73941912409279E-03, -6.96392818727665E-01)
-X( 2) = (  4.48516191841765E-01, -1.94053893890630E-01)
-X( 3) = ( -1.38705497587649E+00,  4.92505938623300E-01)
-X( 4) = ( -3.56647313634018E-02,  5.95699545292683E-01)
-
-X( 5) = (  4.59359756666097E-01,  2.04008647679956E-01)
-
-PATH NUMBER =      3086
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.06710036755855E-01, -9.52747539636891E-01)
-X( 2) = (  8.08775793172646E-01, -3.77727575722831E-01)
-X( 3) = ( -1.71240567673777E+00,  3.89746799894389E-01)
-X( 4) = (  1.47616063439630E-02,  5.23339803391981E-01)
-
-X( 5) = (  5.54711712924707E-01,  1.10032475912924E-01)
-
-PATH NUMBER =      3087
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.34237400161441E-01, -1.01256677113244E+00)
-X( 2) = (  1.20281382575967E+00, -2.86859371031489E-01)
-X( 3) = ( -1.89558647204041E+00,  1.01897333374955E-01)
-X( 4) = (  9.99023676654173E-02,  5.00322450283589E-01)
-
-X( 5) = (  7.27957404813474E-01,  2.27442236378009E-02)
-
-PATH NUMBER =      3088
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.43427604082075E-01, -5.50603942584948E-01)
-X( 2) = (  1.57908383042636E+00,  1.94585433927657E-02)
-X( 3) = ( -1.64341934761211E+00, -3.46374997197635E-01)
-X( 4) = ( -3.36600807457890E-02,  2.61615084774576E-01)
-
-X( 5) = (  9.32459205588988E-01,  1.22925891247605E+00)
-
-PATH NUMBER =      3089
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.59212576829561E-01, -2.38439956318118E-01)
-X( 2) = (  1.55802010423423E+00,  4.23289351018664E-01)
-X( 3) = ( -1.39175197257123E+00, -5.76757399918116E-01)
-X( 4) = (  3.79212509782162E-03,  3.41465445199318E-01)
-
-X( 5) = (  4.77563949982426E-02,  1.21659870711108E+00)
-
-PATH NUMBER =      3090
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.47253869236777E-01,  7.51166765734320E-02)
-X( 2) = (  1.28230691428173E+00,  7.19102194950598E-01)
-X( 3) = ( -1.05087662444828E+00, -5.91471888875923E-01)
-X( 4) = ( -1.88446430431608E-02,  4.26708183955441E-01)
-
-X( 5) = ( -2.87604447117812E-02,  7.77208808099839E-01)
-
-PATH NUMBER =      3091
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.59938204868823E-01,  2.43349322765943E-01)
-X( 2) = (  8.80953526358422E-01,  7.68482957919260E-01)
-X( 3) = ( -7.80292667037502E-01, -3.83633391154370E-01)
-X( 4) = ( -9.09783897759159E-02,  4.77457276211442E-01)
-
-X( 5) = (  6.54682366554771E-02,  5.83757377414488E-01)
-
-PATH NUMBER =      3092
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.31703776241390E-01,  1.87540057408339E-01)
-X( 2) = (  5.41757651219675E-01,  5.48325832125564E-01)
-X( 3) = ( -7.06609341217111E-01, -5.04918497049788E-02)
-X( 4) = ( -1.78856933326891E-01,  4.69966657687402E-01)
-
-X( 5) = (  1.65426302957879E-01,  4.83695061443388E-01)
-
-PATH NUMBER =      3093
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.61351204285870E-02, -6.61973439876602E-02)
-X( 2) = (  4.23432808585148E-01,  1.61644783502288E-01)
-X( 3) = ( -8.64303894037418E-01,  2.52072105772262E-01)
-X( 4) = ( -2.41360926507363E-01,  4.07741272039671E-01)
-
-X( 5) = (  2.68430227277167E-01,  4.21506899383563E-01)
-
-PATH NUMBER =      3094
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.40992072639703E-02, -3.99136331331767E-01)
-X( 2) = (  5.81344507357681E-01, -2.10627827818575E-01)
-X( 3) = ( -1.17958929165407E+00,  3.82485437885747E-01)
-X( 4) = ( -2.49244056253683E-01,  3.19897068770952E-01)
-
-X( 5) = (  3.90834799971802E-01,  3.81978634251730E-01)
-
-PATH NUMBER =      3095
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.26548663143919E-01, -6.55491052240993E-01)
-X( 2) = (  9.41604108688562E-01, -3.94301509650777E-01)
-X( 3) = ( -1.50493999251534E+00,  2.79726299156837E-01)
-X( 4) = ( -1.98817718546318E-01,  2.47537326870251E-01)
-
-X( 5) = (  5.65681047996370E-01,  3.76635108033716E-01)
-
-PATH NUMBER =      3096
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.54076026549504E-01, -7.15310283736544E-01)
-X( 2) = (  1.33564214127559E+00, -3.03433304959435E-01)
-X( 3) = ( -1.68812078781798E+00, -8.12316736259698E-03)
-X( 4) = ( -1.13676957224863E-01,  2.24519973761858E-01)
-
-X( 5) = (  8.55198861850988E-01,  5.09850689764672E-01)
-
-PATH NUMBER =      3097
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.67552086588739E-01, -3.10140238998806E-01)
-X( 2) = (  1.69148974278883E+00,  9.21425688358071E-02)
-X( 3) = ( -1.41377159839004E+00, -2.97299219163490E-01)
-X( 4) = ( -1.99889211140603E-02, -8.69480134880365E-02)
-
-X( 5) = (  1.96966394220522E-01,  7.80050502658362E-01)
-
-PATH NUMBER =      3098
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.83337059336224E-01,  2.02374726802318E-03)
-X( 2) = (  1.67042601659669E+00,  4.95973376461705E-01)
-X( 3) = ( -1.16210422334916E+00, -5.27681621883970E-01)
-X( 4) = (  1.74632847295503E-02, -7.09765306329477E-03)
-
-X( 5) = ( -2.41862275026011E-02,  6.61606337766611E-01)
-
-PATH NUMBER =      3099
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.71378351743440E-01,  3.15580380159574E-01)
-X( 2) = (  1.39471282664419E+00,  7.91786220393639E-01)
-X( 3) = ( -8.21228875226208E-01, -5.42396110841777E-01)
-X( 4) = ( -5.17348341143215E-03,  7.81450856928287E-02)
-
-X( 5) = ( -3.44815291360730E-02,  5.04317211809214E-01)
-
-PATH NUMBER =      3100
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.84062687375486E-01,  4.83813026352084E-01)
-X( 2) = (  9.93359438720890E-01,  8.41166983362301E-01)
-X( 3) = ( -5.50644917815429E-01, -3.34557613120224E-01)
-X( 4) = ( -7.73072301441872E-02,  1.28894177948829E-01)
-
-X( 5) = (  1.80249931300349E-02,  4.19301660753657E-01)
-
-PATH NUMBER =      3101
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.58282587480528E-02,  4.28003760994481E-01)
-X( 2) = (  6.54163563582143E-01,  6.21009857568605E-01)
-X( 3) = ( -4.76961591995038E-01, -1.41607167083334E-03)
-X( 4) = ( -1.65185773695162E-01,  1.21403559424789E-01)
-
-X( 5) = (  8.08617144285780E-02,  3.76378423763249E-01)
-
-PATH NUMBER =      3102
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.59740397064750E-01,  1.74266359598481E-01)
-X( 2) = (  5.35838720947616E-01,  2.34328808945329E-01)
-X( 3) = ( -6.34656144815345E-01,  3.01147883806407E-01)
-X( 4) = ( -2.27689766875634E-01,  5.91781737770586E-02)
-
-X( 5) = (  1.49088758103438E-01,  3.58812025366751E-01)
-
-PATH NUMBER =      3103
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.61776310229366E-01, -1.58672627745625E-01)
-X( 2) = (  6.93750419720149E-01, -1.37943802375535E-01)
-X( 3) = ( -9.49941542431993E-01,  4.31561215919893E-01)
-X( 4) = ( -2.35572896621954E-01, -2.86660294916603E-02)
-
-X( 5) = (  2.27698217530706E-01,  3.66882702639668E-01)
-
-PATH NUMBER =      3104
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.06731456505819E-02, -4.15027348654851E-01)
-X( 2) = (  1.05401002105103E+00, -3.21617484207736E-01)
-X( 3) = ( -1.27529224329327E+00,  3.28802077190982E-01)
-X( 4) = ( -1.85146558914589E-01, -1.01025771392362E-01)
-
-X( 5) = (  3.19815109636074E-01,  4.22958471586998E-01)
-
-PATH NUMBER =      3105
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.78200509056168E-01, -4.74846580150402E-01)
-X( 2) = (  1.44804805363806E+00, -2.30749279516394E-01)
-X( 3) = ( -1.45847303859591E+00,  4.09526106715484E-02)
-X( 4) = ( -1.00005797593135E-01, -1.24043124500755E-01)
-
-X( 5) = (  3.78475084849326E-01,  5.87302937470470E-01)
-
-PATH NUMBER =      3106
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.78256534487785E-01, -2.38984958586758E-01)
-X( 2) = (  1.73087727635089E+00,  2.20074890352073E-01)
-X( 3) = ( -1.26939651827977E+00, -1.12090264316342E-01)
-X( 4) = (  2.14535835509978E-01, -3.45175185967123E-01)
-
-X( 5) = (  1.85672964883752E-01,  4.88409346793802E-01)
-
-PATH NUMBER =      3107
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.94041507235270E-01,  7.31790276800708E-02)
-X( 2) = (  1.70981355015875E+00,  6.23905697977970E-01)
-X( 3) = ( -1.01772914323888E+00, -3.42472667036822E-01)
-X( 4) = (  2.51988041353588E-01, -2.65324825542382E-01)
-
-X( 5) = (  7.14895517223146E-02,  4.66776728801639E-01)
-
-PATH NUMBER =      3108
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.82082799642486E-01,  3.86735660571622E-01)
-X( 2) = (  1.43410036020625E+00,  9.19718541909905E-01)
-X( 3) = ( -6.76853795115935E-01, -3.57187155994630E-01)
-X( 4) = (  2.29351273212606E-01, -1.80082086786258E-01)
-
-X( 5) = (  3.64975375956280E-02,  3.87577876236525E-01)
-
-PATH NUMBER =      3109
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.47671352745326E-02,  5.54968306764132E-01)
-X( 2) = (  1.03274697228295E+00,  9.69099304878567E-01)
-X( 3) = ( -4.06269837705155E-01, -1.49348658273077E-01)
-X( 4) = (  1.57217526479851E-01, -1.29332994530257E-01)
-
-X( 5) = (  5.30303783420430E-02,  3.28792988867288E-01)
-
-PATH NUMBER =      3110
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.33467293352901E-01,  4.99159041406529E-01)
-X( 2) = (  6.93551097144204E-01,  7.48942179084870E-01)
-X( 3) = ( -3.32586511884764E-01,  1.83792883176314E-01)
-X( 4) = (  6.93389829288754E-02, -1.36823613054297E-01)
-
-X( 5) = (  8.68832654874529E-02,  2.94526546652647E-01)
-
-PATH NUMBER =      3111
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.49035949165704E-01,  2.45421640010529E-01)
-X( 2) = (  5.75226254509676E-01,  3.62261130461595E-01)
-X( 3) = ( -4.90281064705071E-01,  4.86356838653555E-01)
-X( 4) = (  6.83498974840315E-03, -1.99048998702028E-01)
-
-X( 5) = (  1.28335894434759E-01,  2.78687598453420E-01)
-
-PATH NUMBER =      3112
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.51071862330320E-01, -8.75173473335777E-02)
-X( 2) = (  7.33137953282209E-01, -1.00114808592690E-02)
-X( 3) = ( -8.05566462321719E-01,  6.16770170767041E-01)
-X( 4) = ( -1.04813999791618E-03, -2.86893201970747E-01)
-
-X( 5) = (  1.76255897377051E-01,  2.81602907515526E-01)
-
-PATH NUMBER =      3113
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.38622406450372E-01, -3.43872068242804E-01)
-X( 2) = (  1.09339755461309E+00, -1.93685162691470E-01)
-X( 3) = ( -1.13091716318299E+00,  5.14011032038129E-01)
-X( 4) = (  4.93781977094486E-02, -3.59252943871449E-01)
-
-X( 5) = (  2.27558593480585E-01,  3.14006161171870E-01)
-
-PATH NUMBER =      3114
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.89049569552141E-02, -4.03691299738355E-01)
-X( 2) = (  1.48743558720012E+00, -1.02816958000128E-01)
-X( 3) = ( -1.31409795848564E+00,  2.26161565518696E-01)
-X( 4) = (  1.34518959030903E-01, -3.82270296979842E-01)
-
-X( 5) = (  2.54781717084369E-01,  3.95511643186808E-01)
-
-PATH NUMBER =      3115
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10905551769177E-01, -3.70432447856457E-01)
-X( 2) = (  1.67881656641518E+00,  3.43394552894723E-01)
-X( 3) = ( -1.27784881181517E+00,  1.22590539002575E-01)
-X( 4) = (  5.60177449049598E-01, -3.92239068784371E-01)
-
-X( 5) = (  2.32282468480957E-01,  3.44931933255956E-01)
-
-PATH NUMBER =      3116
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.26690524516662E-01, -5.82684615896273E-02)
-X( 2) = (  1.65775284022304E+00,  7.47225360520621E-01)
-X( 3) = ( -1.02618143677429E+00, -1.07791863717906E-01)
-X( 4) = (  5.97629654893209E-01, -3.12388708359629E-01)
-
-X( 5) = (  1.57325008051380E-01,  3.67667138357213E-01)
-
-PATH NUMBER =      3117
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14731816923878E-01,  2.55288171301923E-01)
-X( 2) = (  1.38203965027054E+00,  1.04303820445256E+00)
-X( 3) = ( -6.85306088651342E-01, -1.22506352675713E-01)
-X( 4) = (  5.74992886752226E-01, -2.27145969603505E-01)
-
-X( 5) = (  1.06951378254527E-01,  3.26921092117917E-01)
-
-PATH NUMBER =      3118
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.72583847444075E-01,  4.23520817494434E-01)
-X( 2) = (  9.80686262347239E-01,  1.09241896742122E+00)
-X( 3) = ( -4.14722131240563E-01,  8.53321450458401E-02)
-X( 4) = (  5.02859140019471E-01, -1.76396877347505E-01)
-
-X( 5) = (  1.00537858858444E-01,  2.79264368544233E-01)
-
-PATH NUMBER =      3119
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.00818276071509E-01,  3.67711552136830E-01)
-X( 2) = (  6.41490387208491E-01,  8.72261841627521E-01)
-X( 3) = ( -3.41038805420172E-01,  4.18473686495231E-01)
-X( 4) = (  4.14980596468496E-01, -1.83887495871545E-01)
-
-X( 5) = (  1.16561102713245E-01,  2.44899910650881E-01)
-
-PATH NUMBER =      3120
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.16386931884311E-01,  1.13974150740831E-01)
-X( 2) = (  5.23165544573964E-01,  4.85580793004245E-01)
-X( 3) = ( -4.98733358240478E-01,  7.21037641972472E-01)
-X( 4) = (  3.52476603288024E-01, -2.46112881519276E-01)
-
-X( 5) = (  1.43405098618549E-01,  2.24060591849393E-01)
-
-PATH NUMBER =      3121
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.18422845048928E-01, -2.18964836603276E-01)
-X( 2) = (  6.81077243346497E-01,  1.13308181683381E-01)
-X( 3) = ( -8.14018755857127E-01,  8.51450974085957E-01)
-X( 4) = (  3.44593473541704E-01, -3.33957084787995E-01)
-
-X( 5) = (  1.77818201347358E-01,  2.16926218992194E-01)
-
-PATH NUMBER =      3122
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.05973389168980E-01, -4.75319557512501E-01)
-X( 2) = (  1.04133684467738E+00, -7.03655001488197E-02)
-X( 3) = ( -1.13936945671840E+00,  7.48691835357046E-01)
-X( 4) = (  3.95019811249069E-01, -4.06316826688697E-01)
-
-X( 5) = (  2.17686325331495E-01,  2.29429691112614E-01)
-
-PATH NUMBER =      3123
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.78446025763394E-01, -5.35138789008053E-01)
-X( 2) = (  1.43537487726440E+00,  2.05027045425218E-02)
-X( 3) = ( -1.32255025202104E+00,  4.60842368837613E-01)
-X( 4) = (  4.80160572570523E-01, -4.29334179797089E-01)
-
-X( 5) = (  2.49836622719566E-01,  2.74398155307019E-01)
-
-PATH NUMBER =      3124
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.40436547784456E-03, -6.42976965702491E-01)
-X( 2) = (  1.55966739775095E+00,  4.04398915814667E-01)
-X( 3) = ( -1.43517355691427E+00,  2.96933434733735E-01)
-X( 4) = (  8.55206367150968E-01, -2.06117948112795E-01)
-
-X( 5) = (  2.86924775591109E-01,  2.49678565408065E-01)
-
-PATH NUMBER =      3125
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06380607269641E-01, -3.30812979435662E-01)
-X( 2) = (  1.53860367155882E+00,  8.08229723440565E-01)
-X( 3) = ( -1.18350618187338E+00,  6.65510320132544E-02)
-X( 4) = (  8.92658572994578E-01, -1.26267587688054E-01)
-
-X( 5) = (  2.40261040132369E-01,  3.00381006248126E-01)
-
-PATH NUMBER =      3126
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.57810032314270E-03, -1.72563465441114E-02)
-X( 2) = (  1.26289048160632E+00,  1.10404256737250E+00)
-X( 3) = ( -8.42630833750435E-01,  5.18365430554474E-02)
-X( 4) = (  8.70021804853596E-01, -4.10248489319303E-02)
-
-X( 5) = (  1.79414029607873E-01,  2.89830872925928E-01)
-
-PATH NUMBER =      3127
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.92893764691097E-01,  1.50976299648399E-01)
-X( 2) = (  8.61537093683016E-01,  1.15342333034116E+00)
-X( 3) = ( -5.72046876339655E-01,  2.59675040777000E-01)
-X( 4) = (  7.97888058120841E-01,  9.72424332407088E-03)
-
-X( 5) = (  1.53689783583859E-01,  2.50307780754119E-01)
-
-PATH NUMBER =      3128
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.21128193318530E-01,  9.51670342907955E-02)
-X( 2) = (  5.22341218544270E-01,  9.33266204547465E-01)
-X( 3) = ( -4.98363550519264E-01,  5.92816582226391E-01)
-X( 4) = (  7.10009514569865E-01,  2.23362480003059E-03)
-
-X( 5) = (  1.55403226961584E-01,  2.13783701987330E-01)
-
-PATH NUMBER =      3129
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.36696849131333E-01, -1.58570367105204E-01)
-X( 2) = (  4.04016375909742E-01,  5.46585155924189E-01)
-X( 3) = ( -6.56058103339571E-01,  8.95380537703632E-01)
-X( 4) = (  6.47505521389393E-01, -5.99917608477001E-02)
-
-X( 5) = (  1.71973628000236E-01,  1.86861288279635E-01)
-
-PATH NUMBER =      3130
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.38732762295949E-01, -4.91509354449310E-01)
-X( 2) = (  5.61928074682275E-01,  1.74312544603326E-01)
-X( 3) = ( -9.71343500956219E-01,  1.02579386981712E+00)
-X( 4) = (  6.39622391643074E-01, -1.47835964116419E-01)
-
-X( 5) = (  1.98590595831579E-01,  1.70394057071943E-01)
-
-PATH NUMBER =      3131
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.26283306416001E-01, -7.47864075358537E-01)
-X( 2) = (  9.22187676013156E-01, -9.36113722887525E-03)
-X( 3) = ( -1.29669420181749E+00,  9.23034731088206E-01)
-X( 4) = (  6.90048729350439E-01, -2.20195706017120E-01)
-
-X( 5) = (  2.34057088052924E-01,  1.68284429509263E-01)
-
-PATH NUMBER =      3132
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.98755943010415E-01, -8.07683306854088E-01)
-X( 2) = (  1.31622570860018E+00,  8.15070674624665E-02)
-X( 3) = ( -1.47987499712014E+00,  6.35185264568773E-01)
-X( 4) = (  7.75189490671894E-01, -2.43213059125513E-01)
-
-X( 5) = (  2.72841542356396E-01,  1.91633165415871E-01)
-
-PATH NUMBER =      3133
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.36211301223932E-02, -9.29091903229786E-01)
-X( 2) = (  1.42918099057172E+00,  3.74543359713691E-01)
-X( 3) = ( -1.66775675687540E+00,  3.29361444359072E-01)
-X( 4) = (  9.61575280153265E-01,  1.26100035179527E-01)
-
-X( 5) = (  3.52716000088665E-01,  1.69927033266778E-01)
-
-PATH NUMBER =      3134
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.89406102869878E-01, -6.16927916962956E-01)
-X( 2) = (  1.40811726437959E+00,  7.78374167339589E-01)
-X( 3) = ( -1.41608938183451E+00,  9.89790416385916E-02)
-X( 4) = (  9.99027485996875E-01,  2.05950395604269E-01)
-
-X( 5) = (  3.36727318993807E-01,  2.45038656739560E-01)
-
-PATH NUMBER =      3135
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.74473952770952E-02, -3.03371284071406E-01)
-X( 2) = (  1.13240407442709E+00,  1.07418701127152E+00)
-X( 3) = ( -1.07521403371157E+00,  8.42645526807844E-02)
-X( 4) = (  9.76390717855893E-01,  2.91193134360392E-01)
-
-X( 5) = (  2.66359468807455E-01,  2.68545401267723E-01)
-
-PATH NUMBER =      3136
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.09868269090859E-01, -1.35138637878895E-01)
-X( 2) = (  7.31050686503782E-01,  1.12356777424018E+00)
-X( 3) = ( -8.04630076300787E-01,  2.92103050402337E-01)
-X( 4) = (  9.04256971123137E-01,  3.41942226616393E-01)
-
-X( 5) = (  2.18139942931022E-01,  2.37351526192473E-01)
-
-PATH NUMBER =      3137
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.38102697718292E-01, -1.90947903236499E-01)
-X( 2) = (  3.91854811365035E-01,  9.03410648446489E-01)
-X( 3) = ( -7.30946750480396E-01,  6.25244591851728E-01)
-X( 4) = (  8.16378427572162E-01,  3.34451608092353E-01)
-
-X( 5) = (  2.04493781069325E-01,  1.96509280240288E-01)
-
-PATH NUMBER =      3138
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.53671353531095E-01, -4.44685304632498E-01)
-X( 2) = (  2.73529968730508E-01,  5.16729599823213E-01)
-X( 3) = ( -8.88641303300703E-01,  9.27808547328969E-01)
-X( 4) = (  7.53874434391690E-01,  2.72226222444622E-01)
-
-X( 5) = (  2.11579113360702E-01,  1.61654413837949E-01)
-
-PATH NUMBER =      3139
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.55707266695712E-01, -7.77624291976605E-01)
-X( 2) = (  4.31441667503041E-01,  1.44456988502349E-01)
-X( 3) = ( -1.20392670091735E+00,  1.05822187944245E+00)
-X( 4) = (  7.45991304645371E-01,  1.84382019175903E-01)
-
-X( 5) = (  2.32231944487250E-01,  1.35036744013023E-01)
-
-PATH NUMBER =      3140
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.43257810815764E-01, -1.03397901288583E+00)
-X( 2) = (  7.91701268833921E-01, -3.92166933298517E-02)
-X( 3) = ( -1.52927740177863E+00,  9.55462740713544E-01)
-X( 4) = (  7.96417642352735E-01,  1.12022277275201E-01)
-
-X( 5) = (  2.65502468266615E-01,  1.19248585097625E-01)
-
-PATH NUMBER =      3141
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.15730447410178E-01, -1.09379824438138E+00)
-X( 2) = (  1.18573930142095E+00,  5.16515113614896E-02)
-X( 3) = ( -1.71245819708127E+00,  6.67613274194111E-01)
-X( 4) = (  8.81558403674190E-01,  8.90049241668085E-02)
-
-X( 5) = (  3.11162874226492E-01,  1.24206756074032E-01)
-
-PATH NUMBER =      3142
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.21133486452937E-01, -1.09490090135599E+00)
-X( 2) = (  1.34841338499152E+00,  2.67797631098987E-01)
-X( 3) = ( -1.86677014756241E+00,  2.04701141777708E-01)
-X( 4) = (  8.29512991503925E-01,  4.48966394518505E-01)
-
-X( 5) = (  4.47566138184570E-01,  8.99180955101183E-02)
-
-PATH NUMBER =      3143
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.36918459200423E-01, -7.82736915089157E-01)
-X( 2) = (  1.32734965879938E+00,  6.71628438724884E-01)
-X( 3) = ( -1.61510277252153E+00, -2.56812609427720E-02)
-X( 4) = (  8.66965197347536E-01,  5.28816754943247E-01)
-
-X( 5) = (  4.78261164880664E-01,  1.96797016930134E-01)
-
-PATH NUMBER =      3144
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.24959751607640E-01, -4.69180282197606E-01)
-X( 2) = (  1.05163646884688E+00,  9.67441282656819E-01)
-X( 3) = ( -1.27422742439858E+00, -4.03957499005796E-02)
-X( 4) = (  8.44328429206553E-01,  6.14059493699371E-01)
-
-X( 5) = (  3.91962076869280E-01,  2.75319772267785E-01)
-
-PATH NUMBER =      3145
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.76440872396856E-02, -3.00947636005095E-01)
-X( 2) = (  6.50283080923578E-01,  1.01682204562548E+00)
-X( 3) = ( -1.00364346698780E+00,  1.67442747820973E-01)
-X( 4) = (  7.72194682473798E-01,  6.64808585955372E-01)
-
-X( 5) = (  3.05557513897739E-01,  2.52350224398540E-01)
-
-PATH NUMBER =      3146
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.90590341387747E-01, -3.56756901362699E-01)
-X( 2) = (  3.11087205784831E-01,  7.96664919831784E-01)
-X( 3) = ( -9.29960141167413E-01,  5.00584289270364E-01)
-X( 4) = (  6.84316138922823E-01,  6.57317967431332E-01)
-
-X( 5) = (  2.70675401912364E-01,  2.00094780043245E-01)
-
-PATH NUMBER =      3147
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.06158997200550E-01, -6.10494302758698E-01)
-X( 2) = (  1.92762363150304E-01,  4.09983871208508E-01)
-X( 3) = ( -1.08765469398772E+00,  8.03148244747605E-01)
-X( 4) = (  6.21812145742351E-01,  5.95092581783601E-01)
-
-X( 5) = (  2.67483479177835E-01,  1.51465348976091E-01)
-
-PATH NUMBER =      3148
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.08194910365167E-01, -9.43433290102805E-01)
-X( 2) = (  3.50674061922837E-01,  3.77112598876449E-02)
-X( 3) = ( -1.40294009160437E+00,  9.33561576861090E-01)
-X( 4) = (  6.13929015996031E-01,  5.07248378514881E-01)
-
-X( 5) = (  2.83301274788399E-01,  1.10385199973524E-01)
-
-PATH NUMBER =      3149
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.95745454485219E-01, -1.19978801101203E+00)
-X( 2) = (  7.10933663253718E-01, -1.45962421944557E-01)
-X( 3) = ( -1.72829079246564E+00,  8.30802438132180E-01)
-X( 4) = (  6.64355353703396E-01,  4.34888636614180E-01)
-
-X( 5) = (  3.16474562098792E-01,  7.75686344505647E-02)
-
-PATH NUMBER =      3150
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.17819089203659E-02, -1.25960724250758E+00)
-X( 2) = (  1.10497169584074E+00, -5.50942172532150E-02)
-X( 3) = ( -1.91147158776828E+00,  5.42952971612747E-01)
-X( 4) = (  7.49496115024851E-01,  4.11871283505787E-01)
-
-X( 5) = (  3.71880622974255E-01,  6.09824898779960E-02)
-
-PATH NUMBER =      3151
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.17318921193296E-01, -1.06282008709609E+00)
-X( 2) = (  1.35515664129327E+00,  1.34109242736001E-01)
-X( 3) = ( -1.93909315168540E+00, -1.87175319875975E-02)
-X( 4) = (  5.20812913770827E-01,  6.11408372109542E-01)
-
-X( 5) = (  6.26989861102784E-01,  4.48229172323863E-03)
-
-PATH NUMBER =      3152
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.33103893940781E-01, -7.50656100829263E-01)
-X( 2) = (  1.33409291510114E+00,  5.37940050361899E-01)
-X( 3) = ( -1.68742577664451E+00, -2.49099934708078E-01)
-X( 4) = (  5.58265119614437E-01,  6.91258732534284E-01)
-
-X( 5) = (  7.59849492035032E-01,  1.94198149170017E-01)
-
-PATH NUMBER =      3153
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.21145186347998E-01, -4.37099467937712E-01)
-X( 2) = (  1.05837972514864E+00,  8.33752894293833E-01)
-X( 3) = ( -1.34655042852156E+00, -2.63814423665885E-01)
-X( 4) = (  5.35628351473455E-01,  7.76501471290408E-01)
-
-X( 5) = (  5.94539711498308E-01,  4.01260841627105E-01)
-
-PATH NUMBER =      3154
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.33829521980044E-01, -2.68866821745202E-01)
-X( 2) = (  6.57026337225332E-01,  8.83133657262495E-01)
-X( 3) = ( -1.07596647111079E+00, -5.59759259443325E-02)
-X( 4) = (  4.63494604740699E-01,  8.27250563546409E-01)
-
-X( 5) = (  4.15961286432679E-01,  3.54417231855044E-01)
-
-PATH NUMBER =      3155
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.59509335261081E-03, -3.24676087102805E-01)
-X( 2) = (  3.17830462086585E-01,  6.62976531468799E-01)
-X( 3) = ( -1.00228314529039E+00,  2.77165615505059E-01)
-X( 4) = (  3.75616061189724E-01,  8.19759945022369E-01)
-
-X( 5) = (  3.54261466938458E-01,  2.59680725202272E-01)
-
-PATH NUMBER =      3156
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.09973562460192E-01, -5.78413488498805E-01)
-X( 2) = (  1.99505619452058E-01,  2.76295482845523E-01)
-X( 3) = ( -1.15997769811070E+00,  5.79729570982299E-01)
-X( 4) = (  3.13112068009252E-01,  7.57534559374638E-01)
-
-X( 5) = (  3.45744019415851E-01,  1.79534495603189E-01)
-
-PATH NUMBER =      3157
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.12009475624809E-01, -9.11352475842911E-01)
-X( 2) = (  3.57417318224591E-01, -9.59771284753407E-02)
-X( 3) = ( -1.47526309572735E+00,  7.10142903095784E-01)
-X( 4) = (  3.05228938262932E-01,  6.69690356105919E-01)
-
-X( 5) = (  3.63599016526733E-01,  1.12043204910497E-01)
-
-PATH NUMBER =      3158
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.39980255139387E-04, -1.16770719675214E+00)
-X( 2) = (  7.17676919555472E-01, -2.79650810307542E-01)
-X( 3) = ( -1.80061379658862E+00,  6.07383764366874E-01)
-X( 4) = (  3.55655275970297E-01,  5.97330614205217E-01)
-
-X( 5) = (  4.05239827915728E-01,  5.18276322108892E-02)
-
-PATH NUMBER =      3159
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.27967343660725E-01, -1.22752642824769E+00)
-X( 2) = (  1.11171495214250E+00, -1.88782605616200E-01)
-X( 3) = ( -1.98379459189126E+00,  3.19534297847440E-01)
-X( 4) = (  4.40796037291751E-01,  5.74313261096824E-01)
-
-X( 5) = (  4.84055614074658E-01,  2.18983013070964E-03)
-
-PATH NUMBER =      3160
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.20544680751541E-01, -9.12483762631966E-01)
-X( 2) = (  1.26503469103731E+00,  2.73465061255643E-01)
-X( 3) = ( -2.02313494098401E+00, -7.35891871230637E-01)
-X( 4) = (  2.26653521216086E-01,  7.95418283467943E-01)
-
-X( 5) = (  5.57696961592479E-01, -2.82741103697243E-01)
-
-PATH NUMBER =      3161
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.36329653499027E-01, -6.00319776365137E-01)
-X( 2) = (  1.24397096484517E+00,  6.77295868881540E-01)
-X( 3) = ( -1.77146756594313E+00, -9.66274273951118E-01)
-X( 4) = (  2.64105727059696E-01,  8.75268643892685E-01)
-
-X( 5) = (  8.12085511319045E-01, -3.18798124763072E-01)
-
-PATH NUMBER =      3162
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.24370945906243E-01, -2.86763143473586E-01)
-X( 2) = (  9.68257774892676E-01,  9.73108712813475E-01)
-X( 3) = ( -1.43059221782018E+00, -9.80988762908924E-01)
-X( 4) = (  2.41468958918714E-01,  9.60511382648808E-01)
-
-X( 5) = (  1.01082862133353E+00,  4.64252562647408E-02)
-
-PATH NUMBER =      3163
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.37055281538289E-01, -1.18530497281076E-01)
-X( 2) = (  5.66904386969371E-01,  1.02248947578214E+00)
-X( 3) = ( -1.16000826040940E+00, -7.73150265187371E-01)
-X( 4) = (  1.69335212185959E-01,  1.01126047490481E+00)
-
-X( 5) = (  7.18656882678291E-01,  2.65402844937062E-01)
-
-PATH NUMBER =      3164
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.08820852910856E-01, -1.74339762638679E-01)
-X( 2) = (  2.27708511830625E-01,  8.02332349988440E-01)
-X( 3) = ( -1.08632493458901E+00, -4.40008723737980E-01)
-X( 4) = (  8.14566686349842E-02,  1.00376985638077E+00)
-
-X( 5) = (  5.28572589269646E-01,  1.93761273827052E-01)
-
-PATH NUMBER =      3165
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.74780290194676E-03, -4.28077164034679E-01)
-X( 2) = (  1.09383669196098E-01,  4.15651301365164E-01)
-X( 3) = ( -1.24401948740932E+00, -1.37444768260739E-01)
-X( 4) = (  1.89526754545122E-02,  9.41544470733038E-01)
-
-X( 5) = (  4.53525831329373E-01,  9.63826739188198E-02)
-
-PATH NUMBER =      3166
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.78371606656329E-03, -7.61016151378786E-01)
-X( 2) = (  2.67295367968631E-01,  4.33786900443010E-02)
-X( 3) = ( -1.55930488502597E+00, -7.03143614725398E-03)
-X( 4) = (  1.10695457081929E-02,  8.53700267464319E-01)
-
-X( 5) = (  4.26612890555610E-01,  7.17662594272337E-03)
-
-PATH NUMBER =      3167
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.03665739813385E-01, -1.01737087228801E+00)
-X( 2) = (  6.27554969299511E-01, -1.40294991787900E-01)
-X( 3) = ( -1.88465558588724E+00, -1.09790574876166E-01)
-X( 4) = (  6.14958834155570E-02,  7.81340525563617E-01)
-
-X( 5) = (  4.27504701569819E-01, -8.02313686821951E-02)
-
-PATH NUMBER =      3168
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.31193103218971E-01, -1.07719010378356E+00)
-X( 2) = (  1.02159300188654E+00, -4.94267870965587E-02)
-X( 3) = ( -2.06783638118988E+00, -3.97640041395599E-01)
-X( 4) = (  1.46636644737012E-01,  7.58323172455225E-01)
-
-X( 5) = (  4.59845397964359E-01, -1.75761009067667E-01)
-
-PATH NUMBER =      3169
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.40383307139604E-01, -6.15227275236069E-01)
-X( 2) = (  1.39786300655322E+00,  2.56891127327697E-01)
-X( 3) = ( -1.81566925676159E+00, -8.45912371968189E-01)
-X( 4) = (  1.30741963258061E-02,  5.19615806946212E-01)
-
-X( 5) = (  1.01429890317964E+00, -2.78519919896402E-01)
-
-PATH NUMBER =      3170
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.56168279887089E-01, -3.03063288969240E-01)
-X( 2) = (  1.37679928036109E+00,  6.60721934953595E-01)
-X( 3) = ( -1.56400188172071E+00, -1.07629477468867E+00)
-X( 4) = (  5.05264021694163E-02,  5.99466167370954E-01)
-
-X( 5) = (  1.77854989274065E+00,  1.67816482412876E-01)
-
-PATH NUMBER =      3171
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.44209572294306E-01,  1.04933439223110E-02)
-X( 2) = (  1.10108609040859E+00,  9.56534778885529E-01)
-X( 3) = ( -1.22312653359776E+00, -1.09100926364648E+00)
-X( 4) = (  2.78896340284338E-02,  6.84708906127077E-01)
-
-X( 5) = (  9.64517569743888E-01,  1.04379410479554E+00)
-
-PATH NUMBER =      3172
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.56893907926352E-01,  1.78725990114822E-01)
-X( 2) = (  6.99732702485287E-01,  1.00591554185419E+00)
-X( 3) = ( -9.52542576186978E-01, -8.83170765924923E-01)
-X( 4) = ( -4.42441127043212E-02,  7.35457998383078E-01)
-
-X( 5) = (  5.24024458273507E-01,  6.77122875806750E-01)
-
-PATH NUMBER =      3173
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.28659479298919E-01,  1.22916724757218E-01)
-X( 2) = (  3.60536827346540E-01,  7.85758416060495E-01)
-X( 3) = ( -8.78859250366587E-01, -5.50029224475532E-01)
-X( 4) = ( -1.32122656255296E-01,  7.27967379859038E-01)
-
-X( 5) = (  4.60722019167595E-01,  4.30766642511803E-01)
-
-PATH NUMBER =      3174
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.30908234861161E-02, -1.30820676638781E-01)
-X( 2) = (  2.42211984712013E-01,  3.99077367437219E-01)
-X( 3) = ( -1.03655380318689E+00, -2.47465268998291E-01)
-X( 4) = ( -1.94626649435768E-01,  6.65741994211307E-01)
-
-X( 5) = (  4.69760320936328E-01,  2.70050165584212E-01)
-
-PATH NUMBER =      3175
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10549103214993E-02, -4.63759663982888E-01)
-X( 2) = (  4.00123683484546E-01,  2.68047561163552E-02)
-X( 3) = ( -1.35183920080354E+00, -1.17051936884806E-01)
-X( 4) = ( -2.02509779182087E-01,  5.77897790942588E-01)
-
-X( 5) = (  5.06064704355475E-01,  1.40987024897372E-01)
-
-PATH NUMBER =      3176
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.23504366201447E-01, -7.20114384892114E-01)
-X( 2) = (  7.60383284815427E-01, -1.56868925715846E-01)
-X( 3) = ( -1.67718990166482E+00, -2.19811075613716E-01)
-X( 4) = ( -1.52083441474723E-01,  5.05538049041886E-01)
-
-X( 5) = (  5.71043758742895E-01,  1.54611123605881E-02)
-
-PATH NUMBER =      3177
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.51031729607034E-01, -7.79933616387665E-01)
-X( 2) = (  1.15442131740245E+00, -6.60007210245043E-02)
-X( 3) = ( -1.86037069696746E+00, -5.07660542133151E-01)
-X( 4) = ( -6.69426801532682E-02,  4.82520695933494E-01)
-
-X( 5) = (  6.97259554738180E-01, -1.27515244749881E-01)
-
-PATH NUMBER =      3178
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.64507789646267E-01, -3.74763571649927E-01)
-X( 2) = (  1.51026891891569E+00,  3.29575152770738E-01)
-X( 3) = ( -1.58602150753952E+00, -7.96836593934043E-01)
-X( 4) = (  2.67453559575346E-02,  1.71052708683599E-01)
-
-X( 5) = (  9.43706648444682E-01,  4.97256676383907E-01)
-
-PATH NUMBER =      3179
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.80292762393752E-01, -6.25995853830977E-02)
-X( 2) = (  1.48920519272356E+00,  7.33405960396635E-01)
-X( 3) = ( -1.33435413249863E+00, -1.02721899665452E+00)
-X( 4) = (  6.41975618011451E-02,  2.50903069108341E-01)
-
-X( 5) = (  6.09948187427522E-01,  9.62293216880090E-01)
-
-PATH NUMBER =      3180
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.68334054800969E-01,  2.50957047508453E-01)
-X( 2) = (  1.21349200277106E+00,  1.02921880432857E+00)
-X( 3) = ( -9.93478784375684E-01, -1.04193348561233E+00)
-X( 4) = (  4.15607936601627E-02,  3.36145807864464E-01)
-
-X( 5) = (  2.42994955505369E-01,  7.50867908819578E-01)
-
-PATH NUMBER =      3181
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.81018390433015E-01,  4.19189693700963E-01)
-X( 2) = (  8.12138614847756E-01,  1.07859956729723E+00)
-X( 3) = ( -7.22894826964905E-01, -8.34094987890777E-01)
-X( 4) = ( -3.05729530725924E-02,  3.86894900120465E-01)
-
-X( 5) = (  2.09592216268538E-01,  5.38636411761297E-01)
-
-PATH NUMBER =      3182
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.27839618055820E-02,  3.63380428343360E-01)
-X( 2) = (  4.72942739709009E-01,  8.58442441503535E-01)
-X( 3) = ( -6.49211501144514E-01, -5.00953446441386E-01)
-X( 4) = ( -1.18451496623567E-01,  3.79404281596425E-01)
-
-X( 5) = (  2.49882305794211E-01,  4.13448423049181E-01)
-
-PATH NUMBER =      3183
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.62784694007221E-01,  1.09643026947360E-01)
-X( 2) = (  3.54617897074481E-01,  4.71761392880259E-01)
-X( 3) = ( -8.06906053964821E-01, -1.98389490964145E-01)
-X( 4) = ( -1.80955489804040E-01,  3.17178895948694E-01)
-
-X( 5) = (  3.10253949120937E-01,  3.29933734082754E-01)
-
-PATH NUMBER =      3184
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.64820607171837E-01, -2.23295960396746E-01)
-X( 2) = (  5.12529595847014E-01,  9.94887815593962E-02)
-X( 3) = ( -1.12219145158147E+00, -6.79761588506604E-02)
-X( 4) = ( -1.88838619550359E-01,  2.29334692679975E-01)
-
-X( 5) = (  3.89047202609629E-01,  2.67253596218288E-01)
-
-PATH NUMBER =      3185
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.76288487081109E-02, -4.79650681305972E-01)
-X( 2) = (  8.72789197177895E-01, -8.41849002728047E-02)
-X( 3) = ( -1.44754215244275E+00, -1.70735297579572E-01)
-X( 4) = ( -1.38412281842994E-01,  1.56974950779273E-01)
-
-X( 5) = (  5.02903817483567E-01,  2.22679848838985E-01)
-
-PATH NUMBER =      3186
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.75156212113697E-01, -5.39469912801523E-01)
-X( 2) = (  1.26682722976492E+00,  6.68330441853658E-03)
-X( 3) = ( -1.63072294774539E+00, -4.58584764099005E-01)
-X( 4) = ( -5.32715205215398E-02,  1.33957597670881E-01)
-
-X( 5) = (  6.91627999923907E-01,  2.31341316901023E-01)
-
-PATH NUMBER =      3187
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.75212237545314E-01, -3.03608291237879E-01)
-X( 2) = (  1.54965645247775E+00,  4.57507474287003E-01)
-X( 3) = ( -1.44164642742924E+00, -6.11627639086896E-01)
-X( 4) = (  2.61270112581572E-01, -8.71744637954875E-02)
-
-X( 5) = (  4.83133844431385E-01,  4.09232691934512E-01)
-
-PATH NUMBER =      3188
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.90997210292799E-01,  8.55569502895027E-03)
-X( 2) = (  1.52859272628562E+00,  8.61338281912901E-01)
-X( 3) = ( -1.18997905238836E+00, -8.42010041807377E-01)
-X( 4) = (  2.98722318425182E-01, -7.32410337074584E-03)
-
-X( 5) = (  3.42218488387421E-01,  5.36243412945553E-01)
-
-PATH NUMBER =      3189
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.79038502700015E-01,  3.22112327920501E-01)
-X( 2) = (  1.25287953633312E+00,  1.15715112584484E+00)
-X( 3) = ( -8.49103704265410E-01, -8.56724530765183E-01)
-X( 4) = (  2.76085550284200E-01,  7.79186353853777E-02)
-
-X( 5) = (  2.02175948752109E-01,  4.72327792523456E-01)
-
-PATH NUMBER =      3190
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.17228383320615E-02,  4.90344974113011E-01)
-X( 2) = (  8.51526148409815E-01,  1.20653188881350E+00)
-X( 3) = ( -5.78519746854631E-01, -6.48886033043630E-01)
-X( 4) = (  2.03951803551445E-01,  1.28667727641378E-01)
-
-X( 5) = (  1.72082844967841E-01,  3.76727580539600E-01)
-
-PATH NUMBER =      3191
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.36511590295372E-01,  4.34535708755408E-01)
-X( 2) = (  5.12330273271069E-01,  9.86374763019801E-01)
-X( 3) = ( -5.04836421034240E-01, -3.15744491594239E-01)
-X( 4) = (  1.16073260000470E-01,  1.21177109117338E-01)
-
-X( 5) = (  1.89329597751297E-01,  3.08292236604119E-01)
-
-PATH NUMBER =      3192
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.52080246108174E-01,  1.80798307359408E-01)
-X( 2) = (  3.94005430636541E-01,  5.99693714396525E-01)
-X( 3) = ( -6.62530973854548E-01, -1.31805361169980E-02)
-X( 4) = (  5.35692668199977E-02,  5.89517234696073E-02)
-
-X( 5) = (  2.25550337000971E-01,  2.61856711034938E-01)
-
-PATH NUMBER =      3193
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.54116159272791E-01, -1.52140679984698E-01)
-X( 2) = (  5.51917129409074E-01,  2.27421103075661E-01)
-X( 3) = ( -9.77816371471196E-01,  1.17232795996487E-01)
-X( 4) = (  4.56861370736785E-02, -2.88924797991116E-02)
-
-X( 5) = (  2.76176138044605E-01,  2.32100054171859E-01)
-
-PATH NUMBER =      3194
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.41666703392843E-01, -4.08495400893924E-01)
-X( 2) = (  9.12176730739955E-01,  4.37474212434604E-02)
-X( 3) = ( -1.30316707233247E+00,  1.44736572675760E-02)
-X( 4) = (  9.61124747810431E-02, -1.01252221699813E-01)
-
-X( 5) = (  3.45658909409750E-01,  2.23839274562638E-01)
-
-PATH NUMBER =      3195
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.58606600127434E-02, -4.68314632389475E-01)
-X( 2) = (  1.30621476332698E+00,  1.34615625934802E-01)
-X( 3) = ( -1.48634786763511E+00, -2.73375809251858E-01)
-X( 4) = (  1.81253236102498E-01, -1.24269574808206E-01)
-
-X( 5) = (  4.35664529397723E-01,  2.64794782655921E-01)
-
-PATH NUMBER =      3196
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07861254826707E-01, -4.35055780507577E-01)
-X( 2) = (  1.49759574254204E+00,  5.80827136829654E-01)
-X( 3) = ( -1.45009872096465E+00, -3.76946835767980E-01)
-X( 4) = (  6.06911726121192E-01, -1.34238346612735E-01)
-
-X( 5) = (  3.74051254688909E-01,  2.45557003592267E-01)
-
-PATH NUMBER =      3197
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.23646227574192E-01, -1.22891794240748E-01)
-X( 2) = (  1.47653201634991E+00,  9.84657944455551E-01)
-X( 3) = ( -1.19843134592377E+00, -6.07329238488460E-01)
-X( 4) = (  6.44363931964802E-01, -5.43879861879936E-02)
-
-X( 5) = (  3.26591015407718E-01,  3.31356957283786E-01)
-
-PATH NUMBER =      3198
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11687519981408E-01,  1.90664838650803E-01)
-X( 2) = (  1.20081882639741E+00,  1.28047078838749E+00)
-X( 3) = ( -8.57555997800818E-01, -6.22043727446267E-01)
-X( 4) = (  6.21727163823820E-01,  3.08547525681299E-02)
-
-X( 5) = (  2.37294852609689E-01,  3.31277507210596E-01)
-
-PATH NUMBER =      3199
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.75628144386546E-01,  3.58897484843313E-01)
-X( 2) = (  7.99465438474104E-01,  1.32985155135615E+00)
-X( 3) = ( -5.86972040390039E-01, -4.14205229724713E-01)
-X( 4) = (  5.49593417091065E-01,  8.16038448241303E-02)
-
-X( 5) = (  1.94990935350272E-01,  2.81066906994921E-01)
-
-PATH NUMBER =      3200
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.03862573013979E-01,  3.03088219485710E-01)
-X( 2) = (  4.60269563335357E-01,  1.10969442556245E+00)
-X( 3) = ( -5.13288714569648E-01, -8.10636882753220E-02)
-X( 4) = (  4.61714873540091E-01,  7.41132263000903E-02)
-
-X( 5) = (  1.91620224422394E-01,  2.32624794856980E-01)
-
-PATH NUMBER =      3201
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.19431228826782E-01,  4.93508180897097E-02)
-X( 2) = (  3.41944720700829E-01,  7.23013376939176E-01)
-X( 3) = ( -6.70983267389956E-01,  2.21500267201919E-01)
-X( 4) = (  3.99210880359619E-01,  1.18878406523598E-02)
-
-X( 5) = (  2.08105984469244E-01,  1.95587792657503E-01)
-
-PATH NUMBER =      3202
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.21467141991399E-01, -2.83588169254397E-01)
-X( 2) = (  4.99856419473362E-01,  3.50740765618312E-01)
-X( 3) = ( -9.86268665006605E-01,  3.51913599315404E-01)
-X( 4) = (  3.91327750613299E-01, -7.59563626163589E-02)
-
-X( 5) = (  2.37770882971206E-01,  1.69806764248043E-01)
-
-PATH NUMBER =      3203
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.09017686111450E-01, -5.39942890163623E-01)
-X( 2) = (  8.60116020804243E-01,  1.67067083786111E-01)
-X( 3) = ( -1.31161936586788E+00,  2.49154460586493E-01)
-X( 4) = (  4.41754088320664E-01, -1.48316104517060E-01)
-
-X( 5) = (  2.80664843532858E-01,  1.58504491517321E-01)
-
-PATH NUMBER =      3204
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.81490322705864E-01, -5.99762121659174E-01)
-X( 2) = (  1.25415405339127E+00,  2.57935288477453E-01)
-X( 3) = ( -1.49480016117052E+00, -3.86950059329417E-02)
-X( 4) = (  5.26894849642118E-01, -1.71333457625453E-01)
-
-X( 5) = (  3.35552620548974E-01,  1.75635976414114E-01)
-
-PATH NUMBER =      3205
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.24486624203158E-02, -7.07600298353612E-01)
-X( 2) = (  1.37844657387782E+00,  6.41831499749599E-01)
-X( 3) = ( -1.60742346606374E+00, -2.02603940036819E-01)
-X( 4) = (  9.01940644222563E-01,  5.18827740588406E-02)
-
-X( 5) = (  3.47927899596032E-01,  1.32847871836265E-01)
-
-PATH NUMBER =      3206
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03336310327170E-01, -3.95436312086783E-01)
-X( 2) = (  1.35738284768568E+00,  1.04566230737550E+00)
-X( 3) = ( -1.35575609102286E+00, -4.32986342757299E-01)
-X( 4) = (  9.39392850066173E-01,  1.31733134483582E-01)
-
-X( 5) = (  3.45993973277262E-01,  2.03206627665945E-01)
-
-PATH NUMBER =      3207
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.62239726561358E-03, -8.18796791952323E-02)
-X( 2) = (  1.08166965773319E+00,  1.34147515130743E+00)
-X( 3) = ( -1.01488074289991E+00, -4.47700831715106E-01)
-X( 4) = (  9.16756081925190E-01,  2.16975873239706E-01)
-
-X( 5) = (  2.84945233313232E-01,  2.37726423437120E-01)
-
-PATH NUMBER =      3208
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.95938061633568E-01,  8.63529669972782E-02)
-X( 2) = (  6.80316269809881E-01,  1.39085591427609E+00)
-X( 3) = ( -7.44296785489131E-01, -2.39862333993553E-01)
-X( 4) = (  8.44622335192435E-01,  2.67724965495706E-01)
-
-X( 5) = (  2.33678763539680E-01,  2.16120701118656E-01)
-
-PATH NUMBER =      3209
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.24172490261001E-01,  3.05437016396747E-02)
-X( 2) = (  3.41120394671134E-01,  1.17069878848240E+00)
-X( 3) = ( -6.70613459668741E-01,  9.32792074558380E-02)
-X( 4) = (  7.56743791641460E-01,  2.60234346971666E-01)
-
-X( 5) = (  2.14556766124601E-01,  1.78864150362775E-01)
-
-PATH NUMBER =      3210
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.39741146073804E-01, -2.23193699756325E-01)
-X( 2) = (  2.22795552036608E-01,  7.84017739859120E-01)
-X( 3) = ( -8.28308012489048E-01,  3.95843162933079E-01)
-X( 4) = (  6.94239798460988E-01,  1.98008961323936E-01)
-
-X( 5) = (  2.16814647128551E-01,  1.44647658936766E-01)
-
-PATH NUMBER =      3211
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.41777059238420E-01, -5.56132687100432E-01)
-X( 2) = (  3.80707250809140E-01,  4.11745128538257E-01)
-X( 3) = ( -1.14359341010570E+00,  5.26256495046564E-01)
-X( 4) = (  6.86356668714669E-01,  1.10164758055216E-01)
-
-X( 5) = (  2.33130288708708E-01,  1.17089384789503E-01)
-
-PATH NUMBER =      3212
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.29327603358472E-01, -8.12487408009657E-01)
-X( 2) = (  7.40966852140021E-01,  2.28071446706056E-01)
-X( 3) = ( -1.46894411096697E+00,  4.23497356317652E-01)
-X( 4) = (  7.36783006422034E-01,  3.78050161545151E-02)
-
-X( 5) = (  2.62167962998161E-01,  9.86128354582550E-02)
-
-PATH NUMBER =      3213
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.01800239952886E-01, -8.72306639505208E-01)
-X( 2) = (  1.13500488472705E+00,  3.18939651397398E-01)
-X( 3) = ( -1.65212490626961E+00,  1.35647889798219E-01)
-X( 4) = (  8.21923767743488E-01,  1.47876630461226E-02)
-
-X( 5) = (  3.04319329285750E-01,  9.76184175662522E-02)
-
-PATH NUMBER =      3214
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.05768331799226E-02, -9.93715235880907E-01)
-X( 2) = (  1.24796016669858E+00,  6.11975943648622E-01)
-X( 3) = ( -1.84000666602488E+00, -1.70175930411482E-01)
-X( 4) = (  1.00830955722486E+00,  3.84100757351163E-01)
-
-X( 5) = (  3.48777285437113E-01,  4.20168719283248E-02)
-
-PATH NUMBER =      3215
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.86361805927408E-01, -6.81551249614077E-01)
-X( 2) = (  1.22689644050645E+00,  1.01580675127452E+00)
-X( 3) = ( -1.58833929098399E+00, -4.00558333131962E-01)
-X( 4) = (  1.04576176306847E+00,  4.63951117775905E-01)
-
-X( 5) = (  3.79476402377061E-01,  9.91954793355377E-02)
-
-PATH NUMBER =      3216
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.44030983346245E-02, -3.67994616722527E-01)
-X( 2) = (  9.51183250553951E-01,  1.31161959520645E+00)
-X( 3) = ( -1.24746394286104E+00, -4.15272822089769E-01)
-X( 4) = (  1.02312499492749E+00,  5.49193856532028E-01)
-
-X( 5) = (  3.44572404812207E-01,  1.60092870933289E-01)
-
-PATH NUMBER =      3217
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.12912566033330E-01, -1.99761970530016E-01)
-X( 2) = (  5.49829862630647E-01,  1.36100035817512E+00)
-X( 3) = ( -9.76879985450263E-01, -2.07434324368216E-01)
-X( 4) = (  9.50991248194732E-01,  5.99942948788029E-01)
-
-X( 5) = (  2.85730193967015E-01,  1.65051503410567E-01)
-
-PATH NUMBER =      3218
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.41146994660763E-01, -2.55571235887619E-01)
-X( 2) = (  2.10633987491900E-01,  1.14084323238142E+00)
-X( 3) = ( -9.03196659629872E-01,  1.25707217081175E-01)
-X( 4) = (  8.63112704643757E-01,  5.92452330263989E-01)
-
-X( 5) = (  2.51122611801841E-01,  1.37126854323299E-01)
-
-PATH NUMBER =      3219
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.56715650473566E-01, -5.09308637283619E-01)
-X( 2) = (  9.23091448573728E-02,  7.54162183758144E-01)
-X( 3) = ( -1.06089121245018E+00,  4.28271172558416E-01)
-X( 4) = (  8.00608711463285E-01,  5.30226944616258E-01)
-
-X( 5) = (  2.40338981450737E-01,  1.03548690422207E-01)
-
-PATH NUMBER =      3220
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.58751563638182E-01, -8.42247624627726E-01)
-X( 2) = (  2.50220843629906E-01,  3.81889572437280E-01)
-X( 3) = ( -1.37617661006683E+00,  5.58684504671901E-01)
-X( 4) = (  7.92725581716965E-01,  4.42382741347539E-01)
-
-X( 5) = (  2.45812346431156E-01,  7.24396476571969E-02)
-
-PATH NUMBER =      3221
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.46302107758235E-01, -1.09860234553695E+00)
-X( 2) = (  6.10480444960787E-01,  1.98215890605079E-01)
-X( 3) = ( -1.70152731092810E+00,  4.55925365942991E-01)
-X( 4) = (  8.43151919424330E-01,  3.70022999446837E-01)
-
-X( 5) = (  2.65177904638222E-01,  4.63489761866672E-02)
-
-PATH NUMBER =      3222
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.18774744352648E-01, -1.15842157703250E+00)
-X( 2) = (  1.00451847754781E+00,  2.89084095296420E-01)
-X( 3) = ( -1.88470810623074E+00,  1.68075899423557E-01)
-X( 4) = (  9.28292680745785E-01,  3.47005646338445E-01)
-
-X( 5) = (  3.00131546546901E-01,  3.08044858131290E-02)
-
-PATH NUMBER =      3223
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.18089189510468E-01, -1.15952423400711E+00)
-X( 2) = (  1.16719256111838E+00,  5.05230215033917E-01)
-X( 3) = ( -2.03902005671189E+00, -2.94836232992847E-01)
-X( 4) = (  8.76247268575519E-01,  7.06967116690142E-01)
-
-X( 5) = (  3.68309907116821E-01, -4.63915457756347E-02)
-
-PATH NUMBER =      3224
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.33874162257953E-01, -8.47360247740277E-01)
-X( 2) = (  1.14612883492625E+00,  9.09061022659814E-01)
-X( 3) = ( -1.78735268167101E+00, -5.25218635713327E-01)
-X( 4) = (  9.13699474419129E-01,  7.86817477114883E-01)
-
-X( 5) = (  4.32213579702931E-01, -6.03941181318717E-03)
-
-PATH NUMBER =      3225
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.21915454665170E-01, -5.33803614848727E-01)
-X( 2) = (  8.70415644973748E-01,  1.20487386659175E+00)
-X( 3) = ( -1.44647733354806E+00, -5.39933124671134E-01)
-X( 4) = (  8.91062706278147E-01,  8.72060215871007E-01)
-
-X( 5) = (  4.31598943771274E-01,  8.34564286571542E-02)
-
-PATH NUMBER =      3226
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.45997902972152E-02, -3.65570968656216E-01)
-X( 2) = (  4.69062257050443E-01,  1.25425462956041E+00)
-X( 3) = ( -1.17589337613728E+00, -3.32094626949580E-01)
-X( 4) = (  8.18928959545392E-01,  9.22809308127008E-01)
-
-X( 5) = (  3.62915648849722E-01,  1.23198950083847E-01)
-
-PATH NUMBER =      3227
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.93634638330218E-01, -4.21380234013820E-01)
-X( 2) = (  1.29866381911697E-01,  1.03409750376671E+00)
-X( 3) = ( -1.10221005031689E+00,  1.04691449981090E-03)
-X( 4) = (  7.31050415994417E-01,  9.15318689602968E-01)
-
-X( 5) = (  3.07148439052908E-01,  1.05181846536631E-01)
-
-PATH NUMBER =      3228
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.09203294143020E-01, -6.75117635409819E-01)
-X( 2) = (  1.15415392771693E-02,  6.47416455143439E-01)
-X( 3) = ( -1.25990460313720E+00,  3.03610869977052E-01)
-X( 4) = (  6.68546422813945E-01,  8.53093303955237E-01)
-
-X( 5) = (  2.80613956913118E-01,  6.98104504842627E-02)
-
-PATH NUMBER =      3229
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.11239207307637E-01, -1.00805662275393E+00)
-X( 2) = (  1.69453238049702E-01,  2.75143843822575E-01)
-X( 3) = ( -1.57519000075385E+00,  4.34024202090536E-01)
-X( 4) = (  6.60663293067625E-01,  7.65249100686518E-01)
-
-X( 5) = (  2.74711814333274E-01,  3.25979768350659E-02)
-
-PATH NUMBER =      3230
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.98789751427689E-01, -1.26441134366315E+00)
-X( 2) = (  5.29712839380583E-01,  9.14701619903741E-02)
-X( 3) = ( -1.90054070161512E+00,  3.31265063361625E-01)
-X( 4) = (  7.11089630774990E-01,  6.92889358785817E-01)
-
-X( 5) = (  2.85207163159011E-01, -3.05301710207495E-03)
-
-PATH NUMBER =      3231
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.87376119778974E-02, -1.32423057515870E+00)
-X( 2) = (  9.23750871967609E-01,  1.82338366681716E-01)
-X( 3) = ( -2.08372149691776E+00,  4.34155968421909E-02)
-X( 4) = (  7.96230392096444E-01,  6.69872005677424E-01)
-
-X( 5) = (  3.14446732276414E-01, -3.38786575974380E-02)
-
-PATH NUMBER =      3232
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.14274624250825E-01, -1.12744341974721E+00)
-X( 2) = (  1.17393581742013E+00,  3.71541826670932E-01)
-X( 3) = ( -2.11134306083487E+00, -5.18254906758152E-01)
-X( 4) = (  5.67547190842421E-01,  8.69409094281179E-01)
-
-X( 5) = (  4.18404582675806E-01, -1.49351234259977E-01)
-
-PATH NUMBER =      3233
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.30059596998310E-01, -8.15279433480384E-01)
-X( 2) = (  1.15287209122800E+00,  7.75372634296829E-01)
-X( 3) = ( -1.85967568579399E+00, -7.48637309478632E-01)
-X( 4) = (  6.04999396686031E-01,  9.49259454705920E-01)
-
-X( 5) = (  5.32853088198638E-01, -1.36930149103177E-01)
-
-PATH NUMBER =      3234
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.18100889405527E-01, -5.01722800588834E-01)
-X( 2) = (  8.77158901275501E-01,  1.07118547822876E+00)
-X( 3) = ( -1.51880033767104E+00, -7.63351798436439E-01)
-X( 4) = (  5.82362628545049E-01,  1.03450219346204E+00)
-
-X( 5) = (  5.94970030023380E-01,  4.18006429213532E-03)
-
-PATH NUMBER =      3235
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.30785225037573E-01, -3.33490154396323E-01)
-X( 2) = (  4.75805513352197E-01,  1.12056624119743E+00)
-X( 3) = ( -1.24821638026026E+00, -5.55513300714886E-01)
-X( 4) = (  5.10228881812294E-01,  1.08525128571805E+00)
-
-X( 5) = (  4.97674553547483E-01,  1.08638492820689E-01)
-
-PATH NUMBER =      3236
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.55079641014020E-03, -3.89299419753926E-01)
-X( 2) = (  1.36609638213450E-01,  9.00409115403729E-01)
-X( 3) = ( -1.17453305443987E+00, -2.22371759265495E-01)
-X( 4) = (  4.22350338261319E-01,  1.07776066719400E+00)
-
-X( 5) = (  3.99576421421642E-01,  9.77823326783943E-02)
-
-PATH NUMBER =      3237
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.13017859402663E-01, -6.43036821149926E-01)
-X( 2) = (  1.82847955789229E-02,  5.13728066780453E-01)
-X( 3) = ( -1.33222760726018E+00,  8.01921962117459E-02)
-X( 4) = (  3.59846345080846E-01,  1.01553528154627E+00)
-
-X( 5) = (  3.49098881744430E-01,  5.16600092896914E-02)
-
-PATH NUMBER =      3238
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.15053772567279E-01, -9.75975808494032E-01)
-X( 2) = (  1.76196494351456E-01,  1.41455455459590E-01)
-X( 3) = ( -1.64751300487683E+00,  2.10605528325231E-01)
-X( 4) = (  3.51963215334528E-01,  9.27691078277554E-01)
-
-X( 5) = (  3.29287197815813E-01,  6.38520876458155E-04)
-
-PATH NUMBER =      3239
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.60431668733175E-03, -1.23233052940326E+00)
-X( 2) = (  5.36456095682337E-01, -4.22182263726114E-02)
-X( 3) = ( -1.97286370573810E+00,  1.07846389596321E-01)
-X( 4) = (  4.02389553041892E-01,  8.55331336376853E-01)
-
-X( 5) = (  3.30693653944523E-01, -5.12433092228842E-02)
-
-PATH NUMBER =      3240
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.24923046718255E-01, -1.29214976089881E+00)
-X( 2) = (  9.30494128269363E-01,  4.86499783187304E-02)
-X( 3) = ( -2.15604450104074E+00, -1.80003076923114E-01)
-X( 4) = (  4.87530314363346E-01,  8.32313983268460E-01)
-
-X( 5) = (  3.55476425754080E-01, -1.04104041685563E-01)
-
-PATH NUMBER =      3241
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.59751691520350E-01, -9.63944943860013E-01)
-X( 2) = (  9.73592762842620E-01,  3.38862472591539E-01)
-X( 3) = ( -1.83398959163787E+00, -1.22927980867478E+00)
-X( 4) = (  9.66143869678580E-02,  1.02309851725749E+00)
-
-X( 5) = (  2.96547340212818E-01, -3.66334634121579E-01)
-
-PATH NUMBER =      3242
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.75536664267835E-01, -6.51780957593184E-01)
-X( 2) = (  9.52529036650485E-01,  7.42693280217436E-01)
-X( 3) = ( -1.58232221659698E+00, -1.45966221139526E+00)
-X( 4) = (  1.34066592811468E-01,  1.10294887768223E+00)
-
-X( 5) = (  3.53433652254450E-01, -4.87244629892111E-01)
-
-PATH NUMBER =      3243
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.63577956675052E-01, -3.38224324701633E-01)
-X( 2) = (  6.76815846697986E-01,  1.03850612414937E+00)
-X( 3) = ( -1.24144686847403E+00, -1.47437670035306E+00)
-X( 4) = (  1.11429824670485E-01,  1.18819161643835E+00)
-
-X( 5) = (  5.67722713260189E-01, -5.58139549851126E-01)
-
-PATH NUMBER =      3244
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.76262292307098E-01, -1.69991678509123E-01)
-X( 2) = (  2.75462458774682E-01,  1.08788688711803E+00)
-X( 3) = ( -9.70862911063256E-01, -1.26653820263151E+00)
-X( 4) = (  3.92960779377306E-02,  1.23894070869435E+00)
-
-X( 5) = (  7.51286246030322E-01, -3.14124914130456E-01)
-
-PATH NUMBER =      3245
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.48027863679664E-01, -2.25800943866726E-01)
-X( 2) = ( -6.37334163640655E-02,  8.67729761324336E-01)
-X( 3) = ( -8.97179585242865E-01, -9.33396661182120E-01)
-X( 4) = ( -4.85824656132448E-02,  1.23145009017031E+00)
-
-X( 5) = (  6.10110013998955E-01, -1.21752822817136E-01)
-
-PATH NUMBER =      3246
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.24592078668615E-02, -4.79538345262726E-01)
-X( 2) = ( -1.82058258998593E-01,  4.81048712701060E-01)
-X( 3) = ( -1.05487413806317E+00, -6.30832705704878E-01)
-X( 4) = ( -1.11086458793717E-01,  1.16922470452258E+00)
-
-X( 5) = (  4.69223859031074E-01, -1.11037856928514E-01)
-
-PATH NUMBER =      3247
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.04232947022453E-02, -8.12477332606833E-01)
-X( 2) = ( -2.41465602260591E-02,  1.08776101380197E-01)
-X( 3) = ( -1.37015953567982E+00, -5.00419373591394E-01)
-X( 4) = ( -1.18969588540036E-01,  1.08138050125386E+00)
-
-X( 5) = (  3.84486354159018E-01, -1.51361634465602E-01)
-
-PATH NUMBER =      3248
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.42872750582194E-01, -1.06883205351606E+00)
-X( 2) = (  3.36113041104821E-01, -7.48975804520043E-02)
-X( 3) = ( -1.69551023654110E+00, -6.03178512320305E-01)
-X( 4) = ( -6.85432508326717E-02,  1.00902075935316E+00)
-
-X( 5) = (  3.32373726848547E-01, -2.06958334470315E-01)
-
-PATH NUMBER =      3249
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.70400113987779E-01, -1.12865128501161E+00)
-X( 2) = (  7.30151073691848E-01,  1.59706242393365E-02)
-X( 3) = ( -1.87869103184374E+00, -8.91027978839737E-01)
-X( 4) = (  1.65975104887832E-02,  9.86003406244768E-01)
-
-X( 5) = (  3.01605554679261E-01, -2.75755746960469E-01)
-
-PATH NUMBER =      3250
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.79590317908412E-01, -6.66688456464116E-01)
-X( 2) = (  1.10642107835853E+00,  3.22288538663593E-01)
-X( 3) = ( -1.62652390741544E+00, -1.33930030941233E+00)
-X( 4) = ( -1.16964937922423E-01,  7.47296040735755E-01)
-
-X( 5) = (  3.99074130687295E-01, -5.69477828843639E-01)
-
-PATH NUMBER =      3251
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.95375290655897E-01, -3.54524470197286E-01)
-X( 2) = (  1.08535735216640E+00,  7.26119346289490E-01)
-X( 3) = ( -1.37485653237456E+00, -1.56968271213281E+00)
-X( 4) = ( -7.95127320788126E-02,  8.27146401160497E-01)
-
-X( 5) = (  4.75450909268642E-01, -8.91449038721513E-01)
-
-PATH NUMBER =      3252
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.83416583063115E-01, -4.09678373057358E-02)
-X( 2) = (  8.09644162213901E-01,  1.02193219022142E+00)
-X( 3) = ( -1.03398118425161E+00, -1.58439720109062E+00)
-X( 4) = ( -1.02149500219795E-01,  9.12389139916620E-01)
-
-X( 5) = (  1.22000190396678E+00, -1.29305030761943E+00)
-
-PATH NUMBER =      3253
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.96100918695161E-01,  1.27264808886775E-01)
-X( 2) = (  4.08290774290597E-01,  1.07131295319009E+00)
-X( 3) = ( -7.63397226840831E-01, -1.37655870336906E+00)
-X( 4) = ( -1.74283246952550E-01,  9.63138232172622E-01)
-
-X( 5) = (  1.60432273384068E+00, -5.86147333091838E-03)
-
-PATH NUMBER =      3254
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67866490067727E-01,  7.14555435291714E-02)
-X( 2) = (  6.90948991518502E-02,  8.51155827396390E-01)
-X( 3) = ( -6.89713901020440E-01, -1.04341716191967E+00)
-X( 4) = ( -2.62161790503525E-01,  9.55647613648581E-01)
-
-X( 5) = (  9.17703573872698E-01,  1.34980275300118E-01)
-
-PATH NUMBER =      3255
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.22978342549245E-02, -1.82281857866828E-01)
-X( 2) = ( -4.92299434826770E-02,  4.64474778773115E-01)
-X( 3) = ( -8.47408453840747E-01, -7.40853206442431E-01)
-X( 4) = ( -3.24665783683997E-01,  8.93422228000850E-01)
-
-X( 5) = (  6.62903796808013E-01, -2.69852596391482E-03)
-
-PATH NUMBER =      3256
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.02619210903078E-02, -5.15220845210935E-01)
-X( 2) = (  1.08681755289856E-01,  9.22021674522513E-02)
-X( 3) = ( -1.16269385145740E+00, -6.10439874328945E-01)
-X( 4) = ( -3.32548913430316E-01,  8.05578024732131E-01)
-
-X( 5) = (  5.43156126967444E-01, -1.29401256691168E-01)
-
-PATH NUMBER =      3257
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.62711376970256E-01, -7.71575566120161E-01)
-X( 2) = (  4.68941356620737E-01, -9.14715143799499E-02)
-X( 3) = ( -1.48804455231867E+00, -7.13199013057857E-01)
-X( 4) = ( -2.82122575722952E-01,  7.33218282831429E-01)
-
-X( 5) = (  4.70851863829846E-01, -2.49436836533141E-01)
-
-PATH NUMBER =      3258
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.90238740375842E-01, -8.31394797615712E-01)
-X( 2) = (  8.62979389207763E-01, -6.03309688608498E-04)
-X( 3) = ( -1.67122534762131E+00, -1.00104847957729E+00)
-X( 4) = ( -1.96981814401497E-01,  7.10200929723036E-01)
-
-X( 5) = (  4.21955037990632E-01, -3.84016495711289E-01)
-
-PATH NUMBER =      3259
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.03714800415076E-01, -4.26224752877974E-01)
-X( 2) = (  1.21882699072100E+00,  3.94972564106634E-01)
-X( 3) = ( -1.39687615819337E+00, -1.29022453137818E+00)
-X( 4) = ( -1.03293778290694E-01,  3.98732942473142E-01)
-
-X( 5) = (  9.41776720739597E-01, -6.24009286022084E-01)
-
-PATH NUMBER =      3260
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.19499773162561E-01, -1.14060766611145E-01)
-X( 2) = (  1.19776326452887E+00,  7.98803371732532E-01)
-X( 3) = ( -1.14520878315249E+00, -1.52060693409866E+00)
-X( 4) = ( -6.58415724470834E-02,  4.78583302897884E-01)
-
-X( 5) = (  2.13475778330788E+00, -1.04134781901562E+00)
-
-PATH NUMBER =      3261
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.07541065569777E-01,  1.99495866280406E-01)
-X( 2) = (  9.22050074576370E-01,  1.09461621566447E+00)
-X( 3) = ( -8.04333435029537E-01, -1.53532142305647E+00)
-X( 4) = ( -8.84783405880656E-02,  5.63826041654008E-01)
-
-X( 5) = (  1.78432055679195E+00,  1.67067672995527E+00)
-
-PATH NUMBER =      3262
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.20225401201824E-01,  3.67728512472916E-01)
-X( 2) = (  5.20696686653065E-01,  1.14399697863313E+00)
-X( 3) = ( -5.33749477618758E-01, -1.32748292533492E+00)
-X( 4) = ( -1.60612087320821E-01,  6.14575133910008E-01)
-
-X( 5) = (  7.06583154153537E-01,  9.05102917159029E-01)
-
-PATH NUMBER =      3263
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.19909725743902E-02,  3.11919247115313E-01)
-X( 2) = (  1.81500811514319E-01,  9.23839852839432E-01)
-X( 3) = ( -4.60066151798367E-01, -9.94341383885526E-01)
-X( 4) = ( -2.48490630871796E-01,  6.07084515385968E-01)
-
-X( 5) = (  5.84968430912409E-01,  5.05176304486473E-01)
-
-PATH NUMBER =      3264
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.23577683238413E-01,  5.81818457193134E-02)
-X( 2) = (  6.31759688797913E-02,  5.37158804216156E-01)
-X( 3) = ( -6.17760704618674E-01, -6.91777428408285E-01)
-X( 4) = ( -3.10994624052268E-01,  5.44859129738237E-01)
-
-X( 5) = (  5.71760398945827E-01,  2.74642611083701E-01)
-
-PATH NUMBER =      3265
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.25613596403029E-01, -2.74757141624793E-01)
-X( 2) = (  2.21087667652325E-01,  1.64886192895292E-01)
-X( 3) = ( -9.33046102235323E-01, -5.61364096294800E-01)
-X( 4) = ( -3.18877753798587E-01,  4.57014926469518E-01)
-
-X( 5) = (  5.88208532473659E-01,  9.72855261292916E-02)
-
-PATH NUMBER =      3266
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.68358594769192E-02, -5.31111862534019E-01)
-X( 2) = (  5.81347268983205E-01, -1.87874889369090E-02)
-X( 3) = ( -1.25839680309660E+00, -6.64123235023711E-01)
-X( 4) = ( -2.68451416091223E-01,  3.84655184568817E-01)
-
-X( 5) = (  6.27381545522349E-01, -7.57926723383196E-02)
-
-PATH NUMBER =      3267
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14363222882505E-01, -5.90931094029570E-01)
-X( 2) = (  9.75385301570231E-01,  7.20807157544327E-02)
-X( 3) = ( -1.44157759839924E+00, -9.51972701543145E-01)
-X( 4) = ( -1.83310654769768E-01,  3.61637831460424E-01)
-
-X( 5) = (  7.10090722595792E-01, -2.88391810365066E-01)
-
-PATH NUMBER =      3268
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14419248314122E-01, -3.55069472465926E-01)
-X( 2) = (  1.25821452428306E+00,  5.22904885622899E-01)
-X( 3) = ( -1.25250107808310E+00, -1.10501557653104E+00)
-X( 4) = (  1.31230978333344E-01,  1.40505769994055E-01)
-
-X( 5) = (  8.91474393768154E-01,  7.59565594016829E-02)
-
-PATH NUMBER =      3269
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.30204221061607E-01, -4.29054861990970E-02)
-X( 2) = (  1.23715079809093E+00,  9.26735693248797E-01)
-X( 3) = ( -1.00083370304221E+00, -1.33539797925152E+00)
-X( 4) = (  1.68683184176954E-01,  2.20356130418797E-01)
-
-X( 5) = (  1.03574494954685E+00,  5.48259915938793E-01)
-
-PATH NUMBER =      3270
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.18245513468824E-01,  2.70651146692454E-01)
-X( 2) = (  9.61437608138430E-01,  1.22254853718073E+00)
-X( 3) = ( -6.59958354919264E-01, -1.35011246820932E+00)
-X( 4) = (  1.46046416035972E-01,  3.05598869174921E-01)
-
-X( 5) = (  5.61865858133234E-01,  7.19327468864695E-01)
-
-PATH NUMBER =      3271
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.30929849100870E-01,  4.38883792884964E-01)
-X( 2) = (  5.60084220215125E-01,  1.27192930014939E+00)
-X( 3) = ( -3.89374397508485E-01, -1.14227397048777E+00)
-X( 4) = (  7.39126693032166E-02,  3.56347961430922E-01)
-
-X( 5) = (  3.72912831098064E-01,  5.19589030237298E-01)
-
-PATH NUMBER =      3272
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.97304579526563E-01,  3.83074527527360E-01)
-X( 2) = (  2.20888345076379E-01,  1.05177217435570E+00)
-X( 3) = ( -3.15691071688093E-01, -8.09132429038378E-01)
-X( 4) = ( -1.39658742477586E-02,  3.48857342906881E-01)
-
-X( 5) = (  3.49289220989764E-01,  3.68481988807179E-01)
-
-PATH NUMBER =      3273
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.12873235339366E-01,  1.29337126131361E-01)
-X( 2) = (  1.02563502441851E-01,  6.65091125732421E-01)
-X( 3) = ( -4.73385624508401E-01, -5.06568473561138E-01)
-X( 4) = ( -7.64698674282309E-02,  2.86631957259151E-01)
-
-X( 5) = (  3.71827475708307E-01,  2.62059709690570E-01)
-
-PATH NUMBER =      3274
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.14909148503982E-01, -2.03601861212746E-01)
-X( 2) = (  2.60475201214384E-01,  2.92818514411558E-01)
-X( 3) = ( -7.88671022125049E-01, -3.76155141447653E-01)
-X( 4) = ( -8.43529971745502E-02,  1.98787753990432E-01)
-
-X( 5) = (  4.17939408931099E-01,  1.76490363409867E-01)
-
-PATH NUMBER =      3275
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.02459692624034E-01, -4.59956582121971E-01)
-X( 2) = (  6.20734802545265E-01,  1.09144832579356E-01)
-X( 3) = ( -1.11402172298632E+00, -4.78914280176564E-01)
-X( 4) = ( -3.39266594671854E-02,  1.26428012089730E-01)
-
-X( 5) = (  4.93457845564284E-01,  9.98707121825743E-02)
-
-PATH NUMBER =      3276
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25067670781552E-01, -5.19775813617523E-01)
-X( 2) = (  1.01477283513229E+00,  2.00013037270698E-01)
-X( 3) = ( -1.29720251828896E+00, -7.66763746695997E-01)
-X( 4) = (  5.12141018542690E-02,  1.03410658981337E-01)
-
-X( 5) = (  6.28896737509079E-01,  3.68417665164723E-02)
-
-PATH NUMBER =      3277
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.47068265595515E-01, -4.86516961735624E-01)
-X( 2) = (  1.20615381434735E+00,  6.46224548165550E-01)
-X( 3) = ( -1.26095337161850E+00, -8.70334773212119E-01)
-X( 4) = (  4.76872591872964E-01,  9.34418871768080E-02)
-
-X( 5) = (  5.47162385935247E-01,  9.25576294275447E-02)
-
-PATH NUMBER =      3278
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.62853238343000E-01, -1.74352975468795E-01)
-X( 2) = (  1.18509008815522E+00,  1.05005535579145E+00)
-X( 3) = ( -1.00928599657762E+00, -1.10071717593260E+00)
-X( 4) = (  5.14324797716574E-01,  1.73292247601550E-01)
-
-X( 5) = (  5.96856870328981E-01,  2.54731685202903E-01)
-
-PATH NUMBER =      3279
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.50894530750216E-01,  1.39203657422756E-01)
-X( 2) = (  9.09376898202718E-01,  1.34586819972338E+00)
-X( 3) = ( -6.68410648454671E-01, -1.11543166489041E+00)
-X( 4) = (  4.91688029575592E-01,  2.58534986357673E-01)
-
-X( 5) = (  4.56197040644257E-01,  3.64636906900404E-01)
-
-PATH NUMBER =      3280
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.36421133617738E-01,  3.07436303615266E-01)
-X( 2) = (  5.08023510279413E-01,  1.39524896269204E+00)
-X( 3) = ( -3.97826691043892E-01, -9.07593167168853E-01)
-X( 4) = (  4.19554282842837E-01,  3.09284078613674E-01)
-
-X( 5) = (  3.38055345993657E-01,  3.16834190799755E-01)
-
-PATH NUMBER =      3281
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.64655562245171E-01,  2.51627038257663E-01)
-X( 2) = (  1.68827635140667E-01,  1.17509183689835E+00)
-X( 3) = ( -3.24143365223501E-01, -5.74451625719462E-01)
-X( 4) = (  3.31675739291862E-01,  3.01793460089634E-01)
-
-X( 5) = (  2.99142328094178E-01,  2.42371319508605E-01)
-
-PATH NUMBER =      3282
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.80224218057974E-01, -2.11036313833682E-03)
-X( 2) = (  5.05027925061394E-02,  7.88410788275072E-01)
-X( 3) = ( -4.81837918043808E-01, -2.71887670242221E-01)
-X( 4) = (  2.69171746111390E-01,  2.39568074441903E-01)
-
-X( 5) = (  2.99321117188474E-01,  1.79117071857078E-01)
-
-PATH NUMBER =      3283
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.82260131222590E-01, -3.35049350482444E-01)
-X( 2) = (  2.08414491278672E-01,  4.16138176954208E-01)
-X( 3) = ( -7.97123315660457E-01, -1.41474338128736E-01)
-X( 4) = (  2.61288616365070E-01,  1.51723871173184E-01)
-
-X( 5) = (  3.21201259589639E-01,  1.26772867593503E-01)
-
-PATH NUMBER =      3284
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.69810675342642E-01, -5.91404071391670E-01)
-X( 2) = (  5.68674092609553E-01,  2.32464495122007E-01)
-X( 3) = ( -1.12247401652173E+00, -2.44233476857647E-01)
-X( 4) = (  3.11714954072435E-01,  7.93641292724825E-02)
-
-X( 5) = (  3.63943735383978E-01,  8.36236904671998E-02)
-
-PATH NUMBER =      3285
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.42283311937056E-01, -6.51223302887221E-01)
-X( 2) = (  9.62712125196579E-01,  3.23332699813348E-01)
-X( 3) = ( -1.30565481182437E+00, -5.32082943377081E-01)
-X( 4) = (  3.96855715393889E-01,  5.63467761640897E-02)
-
-X( 5) = (  4.37176596204535E-01,  5.80567164778794E-02)
-
-PATH NUMBER =      3286
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67583483484930E-02, -7.59061479581659E-01)
-X( 2) = (  1.08700464568313E+00,  7.07228911085495E-01)
-X( 3) = ( -1.41827811671760E+00, -6.95991877480959E-01)
-X( 4) = (  7.71901509974334E-01,  2.79563007848384E-01)
-
-X( 5) = (  4.13673046148524E-01,  5.45412490868504E-03)
-
-PATH NUMBER =      3287
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.42543321095978E-01, -4.46897493314830E-01)
-X( 2) = (  1.06594091949100E+00,  1.11105971871139E+00)
-X( 3) = ( -1.16661074167671E+00, -9.26374280201438E-01)
-X( 4) = (  8.09353715817944E-01,  3.59413368273126E-01)
-
-X( 5) = (  4.73395252955635E-01,  7.73531090698055E-02)
-
-PATH NUMBER =      3288
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.05846135031948E-02, -1.33340860423279E-01)
-X( 2) = (  7.90227729538496E-01,  1.40687256264333E+00)
-X( 3) = ( -8.25735393553764E-01, -9.41088769159246E-01)
-X( 4) = (  7.86716947676962E-01,  4.44656107029249E-01)
-
-X( 5) = (  4.34475693021722E-01,  1.75834933079184E-01)
-
-PATH NUMBER =      3289
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.56731050864760E-01,  3.48917857692312E-02)
-X( 2) = (  3.88874341615191E-01,  1.45625332561199E+00)
-X( 3) = ( -5.55151436142985E-01, -7.33250271437693E-01)
-X( 4) = (  7.14583200944207E-01,  4.95405199285250E-01)
-
-X( 5) = (  3.48070230779380E-01,  1.89712400892867E-01)
-
-PATH NUMBER =      3290
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.84965479492193E-01, -2.09174795883723E-02)
-X( 2) = (  4.96784664764443E-02,  1.23609619981829E+00)
-X( 3) = ( -4.81468110322594E-01, -4.00108729988302E-01)
-X( 4) = (  6.26704657393232E-01,  4.87914580761210E-01)
-
-X( 5) = (  2.97562245660468E-01,  1.52953641230811E-01)
-
-PATH NUMBER =      3291
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.00534135304995E-01, -2.74654880984372E-01)
-X( 2) = ( -6.86463761580829E-02,  8.49415151195016E-01)
-X( 3) = ( -6.39162663142901E-01, -9.75447745110610E-02)
-X( 4) = (  5.64200664212759E-01,  4.25689195113479E-01)
-
-X( 5) = (  2.80325371706842E-01,  1.08813977126482E-01)
-
-PATH NUMBER =      3292
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.02570048469612E-01, -6.07593868328479E-01)
-X( 2) = (  8.92653226144503E-02,  4.77142539874153E-01)
-X( 3) = ( -9.54448060759550E-01,  3.28685576024242E-02)
-X( 4) = (  5.56317534466440E-01,  3.37844991844760E-01)
-
-X( 5) = (  2.83832607108404E-01,  6.76377800014537E-02)
-
-PATH NUMBER =      3293
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.90120592589664E-01, -8.63948589237704E-01)
-X( 2) = (  4.49524923945331E-01,  2.93468858041951E-01)
-X( 3) = ( -1.27979876162082E+00, -6.98905811264865E-02)
-X( 4) = (  6.06743872173805E-01,  2.65485249944058E-01)
-
-X( 5) = (  3.04527501754683E-01,  3.10130073945859E-02)
-
-PATH NUMBER =      3294
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.62593229184078E-01, -9.23767820733256E-01)
-X( 2) = (  8.43562956532357E-01,  3.84337062733293E-01)
-X( 3) = ( -1.46297955692347E+00, -3.57740047645920E-01)
-X( 4) = (  6.91884633495259E-01,  2.42467896835666E-01)
-
-X( 5) = (  3.46230291521098E-01,  3.57397158489606E-03)
-
-PATH NUMBER =      3295
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09783843948731E-01, -1.04517641710895E+00)
-X( 2) = (  9.56518238503895E-01,  6.77373354984518E-01)
-X( 3) = ( -1.65086131667873E+00, -6.63563867855622E-01)
-X( 4) = (  8.78270422976630E-01,  6.11780991140706E-01)
-
-X( 5) = (  3.49652272528443E-01, -7.48572839507448E-02)
-
-PATH NUMBER =      3296
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.25568816696216E-01, -7.33012430842124E-01)
-X( 2) = (  9.35454512311760E-01,  1.08120416261042E+00)
-X( 3) = ( -1.39919394163784E+00, -8.93946270576102E-01)
-X( 4) = (  9.15722628820240E-01,  6.91631351565448E-01)
-
-X( 5) = (  4.15207002508106E-01, -4.91461103343762E-02)
-
-PATH NUMBER =      3297
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13610109103433E-01, -4.19455797950573E-01)
-X( 2) = (  6.59741322359261E-01,  1.37701700654235E+00)
-X( 3) = ( -1.05831859351490E+00, -9.08660759533909E-01)
-X( 4) = (  8.93085860679258E-01,  7.76874090321572E-01)
-
-X( 5) = (  4.32901070604876E-01,  3.45243040466509E-02)
-
-PATH NUMBER =      3298
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.73705555264521E-01, -2.51223151758063E-01)
-X( 2) = (  2.58387934435957E-01,  1.42639776951101E+00)
-X( 3) = ( -7.87734636104116E-01, -7.00822261812356E-01)
-X( 4) = (  8.20952113946503E-01,  8.27623182577572E-01)
-
-X( 5) = (  3.74519958552861E-01,  8.72355126379269E-02)
-
-PATH NUMBER =      3299
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.01939983891955E-01, -3.07032417115667E-01)
-X( 2) = ( -8.08079407027903E-02,  1.20624064371732E+00)
-X( 3) = ( -7.14051310283725E-01, -3.67680720362965E-01)
-X( 4) = (  7.33073570395528E-01,  8.20132564053532E-01)
-
-X( 5) = (  3.16003459587305E-01,  7.95415942365238E-02)
-
-PATH NUMBER =      3300
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.17508639704757E-01, -5.60769818511666E-01)
-X( 2) = ( -1.99132783337318E-01,  8.19559595094039E-01)
-X( 3) = ( -8.71745863104032E-01, -6.51167648857242E-02)
-X( 4) = (  6.70569577215056E-01,  7.57907178405801E-01)
-
-X( 5) = (  2.84224143231721E-01,  4.87361683358018E-02)
-
-PATH NUMBER =      3301
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.19544552869373E-01, -8.93708805855773E-01)
-X( 2) = ( -4.12210845647842E-02,  4.47286983773176E-01)
-X( 3) = ( -1.18703126072068E+00,  6.52965672277609E-02)
-X( 4) = (  6.62686447468737E-01,  6.70062975137082E-01)
-
-X( 5) = (  2.73211509183978E-01,  1.32537372531022E-02)
-
-PATH NUMBER =      3302
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.07095096989426E-01, -1.15006352676500E+00)
-X( 2) = (  3.19038516766097E-01,  2.63613301940975E-01)
-X( 3) = ( -1.51238196158196E+00, -3.74625715011500E-02)
-X( 4) = (  7.13112785176101E-01,  5.97703233236381E-01)
-
-X( 5) = (  2.78493821806905E-01, -2.23513805656365E-02)
-
-PATH NUMBER =      3303
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.79567733583840E-01, -1.20988275826055E+00)
-X( 2) = (  7.13076549353122E-01,  3.54481506632316E-01)
-X( 3) = ( -1.69556275688460E+00, -3.25312038020583E-01)
-X( 4) = (  7.98253546497556E-01,  5.74685880127988E-01)
-
-X( 5) = (  3.01812464621013E-01, -5.53150366912991E-02)
-
-PATH NUMBER =      3304
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.57296200279276E-01, -1.21098541523515E+00)
-X( 2) = (  8.75750632923691E-01,  5.70627626369813E-01)
-X( 3) = ( -1.84987470736575E+00, -7.88224170436986E-01)
-X( 4) = (  7.46208134327291E-01,  9.34647350479686E-01)
-
-X( 5) = (  3.12619537361647E-01, -1.52915213976124E-01)
-
-PATH NUMBER =      3305
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.73081173026761E-01, -8.98821428968325E-01)
-X( 2) = (  8.54686906731557E-01,  9.74458433995710E-01)
-X( 3) = ( -1.59820733232486E+00, -1.01860657315747E+00)
-X( 4) = (  7.83660340170901E-01,  1.01449771090443E+00)
-
-X( 5) = (  3.79503940737843E-01, -1.63683554323994E-01)
-
-PATH NUMBER =      3306
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.61122465433978E-01, -5.85264796076774E-01)
-X( 2) = (  5.78973716779058E-01,  1.27027127792764E+00)
-X( 3) = ( -1.25733198420191E+00, -1.03332106211527E+00)
-X( 4) = (  7.61023572029918E-01,  1.09974044966055E+00)
-
-X( 5) = (  4.43280196270008E-01, -1.02244362112597E-01)
-
-PATH NUMBER =      3307
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.38068010660239E-02, -4.17032149884264E-01)
-X( 2) = (  1.77620328855753E-01,  1.31965204089631E+00)
-X( 3) = ( -9.86748026791134E-01, -8.25482564393720E-01)
-X( 4) = (  6.88889825297163E-01,  1.15048954191655E+00)
-
-X( 5) = (  4.19739947866650E-01, -1.53809011518729E-02)
-
-PATH NUMBER =      3308
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.54427627561410E-01, -4.72841415241867E-01)
-X( 2) = ( -1.61575546282994E-01,  1.09949491510261E+00)
-X( 3) = ( -9.13064700970743E-01, -4.92341022944329E-01)
-X( 4) = (  6.01011281746188E-01,  1.14299892339251E+00)
-
-X( 5) = (  3.54062253211438E-01,  9.02851933027693E-03)
-
-PATH NUMBER =      3309
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.69996283374212E-01, -7.26578816637866E-01)
-X( 2) = ( -2.79900388917521E-01,  7.12813866479334E-01)
-X( 3) = ( -1.07075925379105E+00, -1.89777067467089E-01)
-X( 4) = (  5.38507288565716E-01,  1.08077353774478E+00)
-
-X( 5) = (  3.06095524238190E-01, -8.53730632402431E-03)
-
-PATH NUMBER =      3310
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.72032196538828E-01, -1.05951780398197E+00)
-X( 2) = ( -1.21988690144988E-01,  3.40541255158471E-01)
-X( 3) = ( -1.38604465140770E+00, -5.93637353536034E-02)
-X( 4) = (  5.30624158819397E-01,  9.92929334476061E-01)
-
-X( 5) = (  2.80144213639804E-01, -4.00395374019387E-02)
-
-PATH NUMBER =      3311
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.59582740658880E-01, -1.31587252489120E+00)
-X( 2) = (  2.38270911185892E-01,  1.56867573326270E-01)
-X( 3) = ( -1.71139535226897E+00, -1.62122874082515E-01)
-X( 4) = (  5.81050496526761E-01,  9.20569592575360E-01)
-
-X( 5) = (  2.71283031447312E-01, -7.65506247546177E-02)
-
-PATH NUMBER =      3312
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.79446227467051E-02, -1.37569175638675E+00)
-X( 2) = (  6.32308943772919E-01,  2.47735778017611E-01)
-X( 3) = ( -1.89457614757161E+00, -4.49972340601947E-01)
-X( 4) = (  6.66191257848216E-01,  8.97552239466967E-01)
-
-X( 5) = (  2.79628496633531E-01, -1.15859554587909E-01)
-
-PATH NUMBER =      3313
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.53481635019634E-01, -1.17890460097526E+00)
-X( 2) = (  8.82493889225444E-01,  4.36939238006828E-01)
-X( 3) = ( -1.92219771148872E+00, -1.01164284420229E+00)
-X( 4) = (  4.37508056594191E-01,  1.09708932807072E+00)
-
-X( 5) = (  2.92037273298236E-01, -2.42254381740215E-01)
-
-PATH NUMBER =      3314
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.69266607767119E-01, -8.66740614708432E-01)
-X( 2) = (  8.61430163033311E-01,  8.40770045632724E-01)
-X( 3) = ( -1.67053033644784E+00, -1.24202524692277E+00)
-X( 4) = (  4.74960262437802E-01,  1.17693968849546E+00)
-
-X( 5) = (  3.56222459823886E-01, -2.94191216193723E-01)
-
-PATH NUMBER =      3315
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.57307900174336E-01, -5.53183981816881E-01)
-X( 2) = (  5.85716973080813E-01,  1.13658288956466E+00)
-X( 3) = ( -1.32965498832489E+00, -1.25673973588058E+00)
-X( 4) = (  4.52323494296821E-01,  1.26218242725159E+00)
-
-X( 5) = (  4.72816300060746E-01, -2.71971202656013E-01)
-
-PATH NUMBER =      3316
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.69992235806382E-01, -3.84951335624370E-01)
-X( 2) = (  1.84363585157507E-01,  1.18596365253332E+00)
-X( 3) = ( -1.05907103091411E+00, -1.04890123815903E+00)
-X( 4) = (  3.80189747564065E-01,  1.31293151950759E+00)
-
-X( 5) = (  5.08304071415523E-01, -1.41168557691400E-01)
-
-PATH NUMBER =      3317
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.17578071789486E-02, -4.40760600981973E-01)
-X( 2) = ( -1.54832289981240E-01,  9.65806526739625E-01)
-X( 3) = ( -9.85387705093722E-01, -7.15759696709635E-01)
-X( 4) = (  2.92311204013089E-01,  1.30544090098355E+00)
-
-X( 5) = (  4.30454018640168E-01, -6.60151954521992E-02)
-
-PATH NUMBER =      3318
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.73810848633854E-01, -6.94498002377973E-01)
-X( 2) = ( -2.73157132615767E-01,  5.79125478116349E-01)
-X( 3) = ( -1.14308225791403E+00, -4.13195741232394E-01)
-X( 4) = (  2.29807210832617E-01,  1.24321551533582E+00)
-
-X( 5) = (  3.56128933542333E-01, -6.71264953114954E-02)
-
-PATH NUMBER =      3319
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.75846761798471E-01, -1.02743698972208E+00)
-X( 2) = ( -1.15245433843234E-01,  2.06852866795486E-01)
-X( 3) = ( -1.45836765553068E+00, -2.82782409118909E-01)
-X( 4) = (  2.21924081086299E-01,  1.15537131206710E+00)
-
-X( 5) = (  3.09335094194815E-01, -9.66266499402992E-02)
-
-PATH NUMBER =      3320
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.66026940814775E-02, -1.28379171063131E+00)
-X( 2) = (  2.45014167487646E-01,  2.31791849632844E-02)
-X( 3) = ( -1.78371835639195E+00, -3.85541547847820E-01)
-X( 4) = (  2.72350418793663E-01,  1.08301157016640E+00)
-
-X( 5) = (  2.83249842369125E-01, -1.36947833412891E-01)
-
-PATH NUMBER =      3321
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.64130057487064E-01, -1.34361094212686E+00)
-X( 2) = (  6.39052200074672E-01,  1.14047389654626E-01)
-X( 3) = ( -1.96689915169459E+00, -6.73391014367253E-01)
-X( 4) = (  3.57491180115117E-01,  1.05999421705800E+00)
-
-X( 5) = (  2.75106423851201E-01, -1.85431573269742E-01)
-
-PATH NUMBER =      3322
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.22864613924323E-01, -9.78164715041061E-01)
-X( 2) = (  7.08298647544908E-01,  2.01624535753068E-01)
-X( 3) = ( -1.37195219487156E+00, -1.48565660946626E+00)
-X( 4) = ( -1.49351402461454E-01,  1.11392415089087E+00)
-
-X( 5) = (  1.16738796600337E-01, -4.00863900734276E-01)
-
-PATH NUMBER =      3323
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03864958667181E+00, -6.66000728774232E-01)
-X( 2) = (  6.87234921352774E-01,  6.05455343378965E-01)
-X( 3) = ( -1.12028481983068E+00, -1.71603901218674E+00)
-X( 4) = ( -1.11899196617843E-01,  1.19377451131561E+00)
-
-X( 5) = (  7.60796315218148E-02, -4.89358841943660E-01)
-
-PATH NUMBER =      3324
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.26690879079025E-01, -3.52444095882681E-01)
-X( 2) = (  4.11521731400275E-01,  9.01268187310899E-01)
-X( 3) = ( -7.79409471707731E-01, -1.73075350114455E+00)
-X( 4) = ( -1.34535964758826E-01,  1.27901725007174E+00)
-
-X( 5) = (  9.61246979281433E-02, -6.38671748967781E-01)
-
-PATH NUMBER =      3325
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.39375214711072E-01, -1.84211449690171E-01)
-X( 2) = (  1.01683434769704E-02,  9.50648950279561E-01)
-X( 3) = ( -5.08825514296952E-01, -1.52291500342299E+00)
-X( 4) = ( -2.06669711491581E-01,  1.32976634232774E+00)
-
-X( 5) = (  3.15472410754330E-01, -7.58270927148188E-01)
-
-PATH NUMBER =      3326
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.11140786083638E-01, -2.40020715047774E-01)
-X( 2) = ( -3.29027531661776E-01,  7.30491824485865E-01)
-X( 3) = ( -4.35142188476560E-01, -1.18977346197360E+00)
-X( 4) = ( -2.94548255042556E-01,  1.32227572380370E+00)
-
-X( 5) = (  5.17252842851972E-01, -5.47932377198729E-01)
-
-PATH NUMBER =      3327
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.55721302708349E-02, -4.93758116443773E-01)
-X( 2) = ( -4.47352374296303E-01,  3.43810775862589E-01)
-X( 3) = ( -5.92836741296868E-01, -8.87209506496360E-01)
-X( 4) = ( -3.57052248223028E-01,  1.26005033815596E+00)
-
-X( 5) = (  4.36016206648644E-01, -3.63556546918793E-01)
-
-PATH NUMBER =      3328
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.35362171062187E-02, -8.26697103787881E-01)
-X( 2) = ( -2.89440675523770E-01, -2.84618354582745E-02)
-X( 3) = ( -9.08122138913517E-01, -7.56796174382875E-01)
-X( 4) = ( -3.64935377969347E-01,  1.17220613488725E+00)
-
-X( 5) = (  3.25147754434383E-01, -3.14977468523821E-01)
-
-PATH NUMBER =      3329
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.05985672986167E-01, -1.08305182469711E+00)
-X( 2) = (  7.08189258071110E-02, -2.12135517290476E-01)
-X( 3) = ( -1.23347283977479E+00, -8.59555313111786E-01)
-X( 4) = ( -3.14509040261982E-01,  1.09984639298654E+00)
-
-X( 5) = (  2.40053052635756E-01, -3.19548924054183E-01)
-
-PATH NUMBER =      3330
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.33513036391753E-01, -1.14287105619266E+00)
-X( 2) = (  4.64856958394137E-01, -1.21267312599134E-01)
-X( 3) = ( -1.41665363507743E+00, -1.14740477963122E+00)
-X( 4) = ( -2.29368278940528E-01,  1.07682903987815E+00)
-
-X( 5) = (  1.72863609058043E-01, -3.48802090546169E-01)
-
-PATH NUMBER =      3331
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.42703240312386E-01, -6.80908227645164E-01)
-X( 2) = (  8.41126963060824E-01,  1.85050601825122E-01)
-X( 3) = ( -1.16448651064914E+00, -1.59567711020381E+00)
-X( 4) = ( -3.62930727351734E-01,  8.38121674369139E-01)
-
-X( 5) = (  4.75121136131408E-02, -5.42843104106813E-01)
-
-PATH NUMBER =      3332
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.05848821305987E+00, -3.68744241378334E-01)
-X( 2) = (  8.20063236868689E-01,  5.88881409451019E-01)
-X( 3) = ( -9.12819135608254E-01, -1.82605951292429E+00)
-X( 4) = ( -3.25478521508123E-01,  9.17972034793881E-01)
-
-X( 5) = ( -8.44575278645788E-02, -6.45188173628242E-01)
-
-PATH NUMBER =      3333
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.46529505467088E-01, -5.51876084867834E-02)
-X( 2) = (  5.44350046916190E-01,  8.84694253382953E-01)
-X( 3) = ( -5.71943787485305E-01, -1.84077400188210E+00)
-X( 4) = ( -3.48115289649106E-01,  1.00321477355000E+00)
-
-X( 5) = ( -2.32546138113078E-01, -8.82447150569215E-01)
-
-PATH NUMBER =      3334
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.59213841099134E-01,  1.13045037705727E-01)
-X( 2) = (  1.42996658992886E-01,  9.34075016351615E-01)
-X( 3) = ( -3.01359830074526E-01, -1.63293550416054E+00)
-X( 4) = ( -4.20249036381862E-01,  1.05396386580600E+00)
-
-X( 5) = ( -9.80683650011301E-02, -1.52565180889514E+00)
-
-PATH NUMBER =      3335
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.30979412471701E-01,  5.72357723481240E-02)
-X( 2) = ( -1.96199216145861E-01,  7.13917890557919E-01)
-X( 3) = ( -2.27676504254135E-01, -1.29979396271115E+00)
-X( 4) = ( -5.08127579932837E-01,  1.04647324728196E+00)
-
-X( 5) = (  9.91653417439958E-01, -1.21963588047624E+00)
-
-PATH NUMBER =      3336
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15410756658898E-01, -1.96501629047876E-01)
-X( 2) = ( -3.14524058780388E-01,  3.27236841934643E-01)
-X( 3) = ( -3.85371057074443E-01, -9.97230007233912E-01)
-X( 4) = ( -5.70631573113309E-01,  9.84247861634234E-01)
-
-X( 5) = (  7.38257678157496E-01, -5.74886837026190E-01)
-
-PATH NUMBER =      3337
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13374843494282E-01, -5.29440616391982E-01)
-X( 2) = ( -1.56612360007854E-01, -4.50357693862204E-02)
-X( 3) = ( -7.00656454691092E-01, -8.66816675120427E-01)
-X( 4) = ( -5.78514702859628E-01,  8.96403658365515E-01)
-
-X( 5) = (  4.69216587773232E-01, -4.64252119246940E-01)
-
-PATH NUMBER =      3338
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.25824299374230E-01, -7.85795337301208E-01)
-X( 2) = (  2.03647241323026E-01, -2.28709451218421E-01)
-X( 3) = ( -1.02600715555237E+00, -9.69575813849338E-01)
-X( 4) = ( -5.28088365152263E-01,  8.24043916464813E-01)
-
-X( 5) = (  2.98754140556603E-01, -4.59964464085515E-01)
-
-PATH NUMBER =      3339
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.53351662779816E-01, -8.45614568796760E-01)
-X( 2) = (  5.97685273910052E-01, -1.37841246527080E-01)
-X( 3) = ( -1.20918795085501E+00, -1.25742528036877E+00)
-X( 4) = ( -4.42947603830808E-01,  8.01026563356421E-01)
-
-X( 5) = (  1.68365802973772E-01, -4.88339352023107E-01)
-
-PATH NUMBER =      3340
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.66827722819049E-01, -4.40444524059022E-01)
-X( 2) = (  9.53532875423292E-01,  2.57734627268162E-01)
-X( 3) = ( -9.34838761427065E-01, -1.54660133216966E+00)
-X( 4) = ( -3.49259567720005E-01,  4.89558576106526E-01)
-
-X( 5) = (  5.57054337266100E-02, -8.74111209604101E-01)
-
-PATH NUMBER =      3341
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.82612695566534E-01, -1.28280537792193E-01)
-X( 2) = (  9.32469149231158E-01,  6.61565434894060E-01)
-X( 3) = ( -6.83171386386182E-01, -1.77698373489015E+00)
-X( 4) = ( -3.11807361876395E-01,  5.69408936531268E-01)
-
-X( 5) = ( -3.67956762886066E-01, -1.07110435352666E+00)
-
-PATH NUMBER =      3342
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.70653987973751E-01,  1.85276095099358E-01)
-X( 2) = (  6.56755959278659E-01,  9.57378278825994E-01)
-X( 3) = ( -3.42296038263233E-01, -1.79169822384795E+00)
-X( 4) = ( -3.34444130017377E-01,  6.54651675287392E-01)
-
-X( 5) = ( -1.34809186806137E+00, -1.36366843622755E+00)
-
-PATH NUMBER =      3343
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.83338323605798E-01,  3.53508741291868E-01)
-X( 2) = (  2.55402571355354E-01,  1.00675904179466E+00)
-X( 3) = ( -7.17120808524537E-02, -1.58385972612640E+00)
-X( 4) = ( -4.06577876750133E-01,  7.05400767543392E-01)
-
-X( 5) = ( -7.17501525119202E+00,  1.99660140839581E+00)
-
-PATH NUMBER =      3344
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.55103894978364E-01,  2.97699475934265E-01)
-X( 2) = ( -8.37933037833925E-02,  7.86601916000960E-01)
-X( 3) = (  1.97124496793774E-03, -1.25071818467701E+00)
-X( 4) = ( -4.94456420301108E-01,  6.97910149019352E-01)
-
-X( 5) = (  2.29751732488537E+00,  1.42821208060915E+00)
-
-PATH NUMBER =      3345
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.04647608344387E-02,  4.39620745382659E-02)
-X( 2) = ( -2.02118146417920E-01,  3.99920867377684E-01)
-X( 3) = ( -1.55723307852370E-01, -9.48154229199767E-01)
-X( 4) = ( -5.56960413481580E-01,  6.35684763371621E-01)
-
-X( 5) = (  1.32066889657378E+00,  5.61459144369116E-02)
-
-PATH NUMBER =      3346
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.25006739990551E-02, -2.88976912805841E-01)
-X( 2) = ( -4.42064476453861E-02,  2.76482560568205E-02)
-X( 3) = ( -4.71008705469019E-01, -8.17740897086282E-01)
-X( 4) = ( -5.64843543227899E-01,  5.47840560102902E-01)
-
-X( 5) = (  8.82601805460265E-01, -3.36068986074567E-01)
-
-PATH NUMBER =      3347
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.49948781880893E-01, -5.45331633715067E-01)
-X( 2) = (  3.16053153685495E-01, -1.56025425775381E-01)
-X( 3) = ( -7.96359406330294E-01, -9.20500035815193E-01)
-X( 4) = ( -5.14417205520534E-01,  4.75480818202200E-01)
-
-X( 5) = (  5.93374853159489E-01, -5.50490308113673E-01)
-
-PATH NUMBER =      3348
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.77476145286479E-01, -6.05150865210618E-01)
-X( 2) = (  7.10091186272521E-01, -6.51572210840387E-02)
-X( 3) = ( -9.79540201632935E-01, -1.20834950233463E+00)
-X( 4) = ( -4.29276444199080E-01,  4.52463465093808E-01)
-
-X( 5) = (  3.40092013165503E-01, -7.14114059393354E-01)
-
-PATH NUMBER =      3349
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.77532170718096E-01, -3.69289243646974E-01)
-X( 2) = (  9.92920408985352E-01,  3.85666948784429E-01)
-X( 3) = ( -7.90463681316792E-01, -1.36139237732252E+00)
-X( 4) = ( -1.14734811095967E-01,  2.31331403627439E-01)
-
-X( 5) = (  8.79641329456903E-01, -1.08996670661770E+00)
-
-PATH NUMBER =      3350
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.93317143465581E-01, -5.71252573801448E-02)
-X( 2) = (  9.71856682793218E-01,  7.89497756410326E-01)
-X( 3) = ( -5.38796306275907E-01, -1.59177478004300E+00)
-X( 4) = ( -7.72826052523570E-02,  3.11181764052181E-01)
-
-X( 5) = (  1.25143687937882E+00, -3.53698190331604E+00)
-
-PATH NUMBER =      3351
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.81358435872798E-01,  2.56431375511406E-01)
-X( 2) = (  6.96143492840719E-01,  1.08531060034226E+00)
-X( 3) = ( -1.97920958152959E-01, -1.60648926900081E+00)
-X( 4) = ( -9.99193733933397E-02,  3.96424502808305E-01)
-
-X( 5) = (  2.01241705373352E-01,  4.68784127543216E+00)
-
-PATH NUMBER =      3352
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.94042771504844E-01,  4.24664021703916E-01)
-X( 2) = (  2.94790104917414E-01,  1.13469136331092E+00)
-X( 3) = (  7.26629992578201E-02, -1.39865077127925E+00)
-X( 4) = ( -1.72053120126095E-01,  4.47173595064306E-01)
-
-X( 5) = (  5.53919200785303E-01,  1.39321679936389E+00)
-
-PATH NUMBER =      3353
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.34191657122590E-01,  3.68854756346313E-01)
-X( 2) = ( -4.44057702213327E-02,  9.14534237517225E-01)
-X( 3) = (  1.46346325078212E-01, -1.06550922982986E+00)
-X( 4) = ( -2.59931663677070E-01,  4.39682976540265E-01)
-
-X( 5) = (  6.37167761441495E-01,  7.19606579135433E-01)
-
-PATH NUMBER =      3354
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.49760312935392E-01,  1.15117354950313E-01)
-X( 2) = ( -1.62730612855860E-01,  5.27853188893949E-01)
-X( 3) = ( -1.13482277420960E-02, -7.62945274352619E-01)
-X( 4) = ( -3.22435656857542E-01,  3.77457590892534E-01)
-
-X( 5) = (  6.81733412196473E-01,  3.71066325965365E-01)
-
-PATH NUMBER =      3355
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.51796226100009E-01, -2.17821632393793E-01)
-X( 2) = ( -4.81891408332617E-03,  1.55580577573086E-01)
-X( 3) = ( -3.26633625358745E-01, -6.32531942239134E-01)
-X( 4) = ( -3.30318786603861E-01,  2.89613387623815E-01)
-
-X( 5) = (  7.15971492625203E-01,  1.08553928417598E-01)
-
-PATH NUMBER =      3356
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.39346770220061E-01, -4.74176353303019E-01)
-X( 2) = (  3.55440687247555E-01, -2.80931042591150E-02)
-X( 3) = ( -6.51984326220020E-01, -7.35291080968045E-01)
-X( 4) = ( -2.79892448896496E-01,  2.17253645723113E-01)
-
-X( 5) = (  7.50279658363958E-01, -1.50158680028330E-01)
-
-PATH NUMBER =      3357
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.88180593185525E-01, -5.33995584798570E-01)
-X( 2) = (  7.49478719834581E-01,  6.27751004322267E-02)
-X( 3) = ( -8.35165121522661E-01, -1.02314054748748E+00)
-X( 4) = ( -1.94751687575042E-01,  1.94236292614721E-01)
-
-X( 5) = (  7.95149140292527E-01, -4.82298883573172E-01)
-
-PATH NUMBER =      3358
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.10181187999488E-01, -5.00736732916672E-01)
-X( 2) = (  9.40859699049641E-01,  5.08986611327078E-01)
-X( 3) = ( -7.98915974852200E-01, -1.12671157400360E+00)
-X( 4) = (  2.30906802443653E-01,  1.84267520810192E-01)
-
-X( 5) = (  8.18553823760035E-01, -2.57699310343336E-01)
-
-PATH NUMBER =      3359
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.25966160746973E-01, -1.88572746649842E-01)
-X( 2) = (  9.19795972857506E-01,  9.12817418952976E-01)
-X( 3) = ( -5.47248599811315E-01, -1.35709397672408E+00)
-X( 4) = (  2.68359008287263E-01,  2.64117881234934E-01)
-
-X( 5) = (  1.32488019810594E+00, -8.03386323236167E-02)
-
-PATH NUMBER =      3360
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.14007453154190E-01,  1.24983886241708E-01)
-X( 2) = (  6.44082782905007E-01,  1.20863026288491E+00)
-X( 3) = ( -2.06373251688367E-01, -1.37180846568189E+00)
-X( 4) = (  2.45722240146280E-01,  3.49360619991057E-01)
-
-X( 5) = (  1.07192077706050E+00,  6.67455067839271E-01)
-
-PATH NUMBER =      3361
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.33082112137642E-02,  2.93216532434218E-01)
-X( 2) = (  2.42729394981702E-01,  1.25801102585357E+00)
-X( 3) = (  6.42107057224128E-02, -1.16396996796034E+00)
-X( 4) = (  1.73588493413525E-01,  4.00109712247057E-01)
-
-X( 5) = (  6.02883631069654E-01,  5.47155860075159E-01)
-
-PATH NUMBER =      3362
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.01542639841198E-01,  2.37407267076615E-01)
-X( 2) = ( -9.64664801570445E-02,  1.03785390005988E+00)
-X( 3) = (  1.37894031542804E-01, -8.30828426510944E-01)
-X( 4) = (  8.57099498625501E-02,  3.92619093723017E-01)
-
-X( 5) = (  4.83218306313861E-01,  3.51697374068309E-01)
-
-PATH NUMBER =      3363
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.17111295654000E-01, -1.63301343193842E-02)
-X( 2) = ( -2.14791322791571E-01,  6.51172851436600E-01)
-X( 3) = ( -1.98005212775037E-02, -5.28264471033703E-01)
-X( 4) = (  2.32059566820782E-02,  3.30393708075286E-01)
-
-X( 5) = (  4.60652443466492E-01,  2.10880782293678E-01)
-
-PATH NUMBER =      3364
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.19147208818617E-01, -3.49269121663491E-01)
-X( 2) = ( -5.68796240190382E-02,  2.78900240115736E-01)
-X( 3) = ( -3.35085918894153E-01, -3.97851138920218E-01)
-X( 4) = (  1.53228269357590E-02,  2.42549504806567E-01)
-
-X( 5) = (  4.73397074218586E-01,  9.63106638849506E-02)
-
-PATH NUMBER =      3365
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.06697752938668E-01, -6.05623842572717E-01)
-X( 2) = (  3.03379977311843E-01,  9.52265582835353E-02)
-X( 3) = ( -6.60436619755428E-01, -5.00610277649129E-01)
-X( 4) = (  6.57491646431239E-02,  1.70189762905866E-01)
-
-X( 5) = (  5.13887890072975E-01, -1.34261712067077E-02)
-
-PATH NUMBER =      3366
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.91703895330825E-02, -6.65443074068268E-01)
-X( 2) = (  6.97418009898868E-01,  1.86094762974877E-01)
-X( 3) = ( -8.43617415058069E-01, -7.88459744168563E-01)
-X( 4) = (  1.50889925964578E-01,  1.47172409797473E-01)
-
-X( 5) = (  6.02124572761271E-01, -1.33925557931700E-01)
-
-PATH NUMBER =      3367
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.98712707524659E-02, -7.73281250762707E-01)
-X( 2) = (  8.21710530385418E-01,  5.69990974247024E-01)
-X( 3) = ( -9.56240719951292E-01, -9.52368678272440E-01)
-X( 4) = (  5.25935720545023E-01,  3.70388641481767E-01)
-
-X( 5) = (  5.07575784755620E-01, -1.79253412158231E-01)
-
-PATH NUMBER =      3368
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.05656243499951E-01, -4.61117264495878E-01)
-X( 2) = (  8.00646804193284E-01,  9.73821781872921E-01)
-X( 3) = ( -7.04573344910408E-01, -1.18275108099292E+00)
-X( 4) = (  5.63387926388634E-01,  4.50239001906509E-01)
-
-X( 5) = (  6.83456464795680E-01, -1.54291721448168E-01)
-
-PATH NUMBER =      3369
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.36975359071682E-02, -1.47560631604327E-01)
-X( 2) = (  5.24933614240785E-01,  1.26963462580485E+00)
-X( 3) = ( -3.63697996787460E-01, -1.19746556995073E+00)
-X( 4) = (  5.40751158247651E-01,  5.35481740662633E-01)
-
-X( 5) = (  7.52129702031430E-01,  8.59074924939967E-02)
-
-PATH NUMBER =      3370
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.93618128460786E-01,  2.06720145881831E-02)
-X( 2) = (  1.23580226317480E-01,  1.31901538877352E+00)
-X( 3) = ( -9.31140393766805E-02, -9.89627072229175E-01)
-X( 4) = (  4.68617411514896E-01,  5.86230832918634E-01)
-
-X( 5) = (  5.71511161813461E-01,  2.05328862619306E-01)
-
-PATH NUMBER =      3371
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.21852557088219E-01, -3.51372507694200E-02)
-X( 2) = ( -2.15615648821267E-01,  1.09885826297982E+00)
-X( 3) = ( -1.94307135562890E-02, -6.56485530779783E-01)
-X( 4) = (  3.80738867963920E-01,  5.78740214394594E-01)
-
-X( 5) = (  4.44407999176668E-01,  1.59640503540749E-01)
-
-PATH NUMBER =      3372
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.37421212901021E-01, -2.88874652165419E-01)
-X( 2) = ( -3.33940491455793E-01,  7.12177214356544E-01)
-X( 3) = ( -1.77125266376596E-01, -3.53921575302542E-01)
-X( 4) = (  3.18234874783448E-01,  5.16514828746862E-01)
-
-X( 5) = (  3.90556624378135E-01,  8.86862692806333E-02)
-
-PATH NUMBER =      3373
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.39457126065638E-01, -6.21813639509526E-01)
-X( 2) = ( -1.76028792683260E-01,  3.39904603035681E-01)
-X( 3) = ( -4.92410663993246E-01, -2.23508243189057E-01)
-X( 4) = (  3.10351745037129E-01,  4.28670625478143E-01)
-
-X( 5) = (  3.73638739255572E-01,  2.01598139425700E-02)
-
-PATH NUMBER =      3374
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.27007670185690E-01, -8.78168360418752E-01)
-X( 2) = (  1.84230808647621E-01,  1.56230921203480E-01)
-X( 3) = ( -8.17761364854521E-01, -3.26267381917968E-01)
-X( 4) = (  3.60778082744494E-01,  3.56310883577441E-01)
-
-X( 5) = (  3.81055012783643E-01, -4.71006928028592E-02)
-
-PATH NUMBER =      3375
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.99480306780105E-01, -9.37987591914303E-01)
-X( 2) = (  5.78268841234647E-01,  2.47099125894822E-01)
-X( 3) = ( -1.00094216015716E+00, -6.14116848437402E-01)
-X( 4) = (  4.45918844065949E-01,  3.33293530469049E-01)
-
-X( 5) = (  4.17362906748898E-01, -1.16546690042565E-01)
-
-PATH NUMBER =      3376
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.72896766352705E-01, -1.05939618829000E+00)
-X( 2) = (  6.91224123206183E-01,  5.40135418146047E-01)
-X( 3) = ( -1.18882391991242E+00, -9.19940668647104E-01)
-X( 4) = (  6.32304633547319E-01,  7.02606624774090E-01)
-
-X( 5) = (  3.56182511019100E-01, -2.12731720633453E-01)
-
-PATH NUMBER =      3377
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.88681739100190E-01, -7.47232202023172E-01)
-X( 2) = (  6.70160397014049E-01,  9.43966225771944E-01)
-X( 3) = ( -9.37156544871540E-01, -1.15032307136758E+00)
-X( 4) = (  6.69756839390929E-01,  7.82456985198832E-01)
-
-X( 5) = (  4.50962762886890E-01, -2.45702915728487E-01)
-
-PATH NUMBER =      3378
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.76723031507407E-01, -4.33675569131621E-01)
-X( 2) = (  3.94447207061551E-01,  1.23977906970388E+00)
-X( 3) = ( -5.96281196748591E-01, -1.16503756032539E+00)
-X( 4) = (  6.47120071249947E-01,  8.67699723954955E-01)
-
-X( 5) = (  5.66842302951785E-01, -1.62536097163878E-01)
-
-PATH NUMBER =      3379
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.10592632860547E-01, -2.65442922939111E-01)
-X( 2) = ( -6.90618086175367E-03,  1.28915983267254E+00)
-X( 3) = ( -3.25697239337812E-01, -9.57199062603838E-01)
-X( 4) = (  5.74986324517192E-01,  9.18448816210956E-01)
-
-X( 5) = (  5.34938946163370E-01, -1.73471049378227E-02)
-
-PATH NUMBER =      3380
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.38827061487981E-01, -3.21252188296714E-01)
-X( 2) = ( -3.46102056000501E-01,  1.06900270687884E+00)
-X( 3) = ( -2.52013913517421E-01, -6.24057521154446E-01)
-X( 4) = (  4.87107780966216E-01,  9.10958197686915E-01)
-
-X( 5) = (  4.31982242332493E-01,  1.84334021765040E-02)
-
-PATH NUMBER =      3381
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.54395717300783E-01, -5.74989589692713E-01)
-X( 2) = ( -4.64426898635028E-01,  6.82321658255568E-01)
-X( 3) = ( -4.09708466337728E-01, -3.21493565677205E-01)
-X( 4) = (  4.24603787785744E-01,  8.48732812039184E-01)
-
-X( 5) = (  3.63095288896397E-01, -8.49768231659731E-03)
-
-PATH NUMBER =      3382
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.56431630465400E-01, -9.07928577036821E-01)
-X( 2) = ( -3.06515199862494E-01,  3.10049046934704E-01)
-X( 3) = ( -7.24993863954378E-01, -1.91080233563720E-01)
-X( 4) = (  4.16720658039426E-01,  7.60888608770466E-01)
-
-X( 5) = (  3.26654939239865E-01, -5.17761397822846E-02)
-
-PATH NUMBER =      3383
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.43982174585452E-01, -1.16428329794605E+00)
-X( 2) = (  5.37444014683861E-02,  1.26375365102503E-01)
-X( 3) = ( -1.05034456481565E+00, -2.93839372292631E-01)
-X( 4) = (  4.67146995746790E-01,  6.88528866869764E-01)
-
-X( 5) = (  3.12025098063629E-01, -1.00710875365532E-01)
-
-PATH NUMBER =      3384
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.16454811179866E-01, -1.22410252944160E+00)
-X( 2) = (  4.47782434055412E-01,  2.17243569793845E-01)
-X( 3) = ( -1.23352536011829E+00, -5.81688838812065E-01)
-X( 4) = (  5.52287757068244E-01,  6.65511513761372E-01)
-
-X( 5) = (  3.18097901508996E-01, -1.55018802505095E-01)
-
-PATH NUMBER =      3385
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.20409122683249E-01, -1.22520518641620E+00)
-X( 2) = (  6.10456517625980E-01,  4.33389689531342E-01)
-X( 3) = ( -1.38783731059944E+00, -1.04460097122847E+00)
-X( 4) = (  5.00242344897980E-01,  1.02547298411307E+00)
-
-X( 5) = (  2.61361723753608E-01, -2.60969166942082E-01)
-
-PATH NUMBER =      3386
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.36194095430734E-01, -9.13041200149372E-01)
-X( 2) = (  5.89392791433846E-01,  8.37220497157239E-01)
-X( 3) = ( -1.13616993555856E+00, -1.27498337394895E+00)
-X( 4) = (  5.37694550741590E-01,  1.10532334453781E+00)
-
-X( 5) = (  3.10634531680944E-01, -3.21068433553353E-01)
-
-PATH NUMBER =      3387
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.24235387837952E-01, -5.99484567257821E-01)
-X( 2) = (  3.13679601481347E-01,  1.13303334108917E+00)
-X( 3) = ( -7.95294587435609E-01, -1.28969786290676E+00)
-X( 4) = (  5.15057782600608E-01,  1.19056608329393E+00)
-
-X( 5) = (  4.23051329785283E-01, -3.27893579696897E-01)
-
-PATH NUMBER =      3388
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.36919723469997E-01, -4.31251921065311E-01)
-X( 2) = ( -8.76737864419579E-02,  1.18241410405783E+00)
-X( 3) = ( -5.24710630024830E-01, -1.08185936518520E+00)
-X( 4) = (  4.42924035867852E-01,  1.24131517554993E+00)
-
-X( 5) = (  4.92259743393161E-01, -2.11861860830477E-01)
-
-PATH NUMBER =      3389
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.91314705157436E-01, -4.87061186422914E-01)
-X( 2) = ( -4.26869661580705E-01,  9.62256978264139E-01)
-X( 3) = ( -4.51027304204438E-01, -7.48717823735811E-01)
-X( 4) = (  3.55045492316877E-01,  1.23382455702589E+00)
-
-X( 5) = (  4.32451531728096E-01, -1.15969900138521E-01)
-
-PATH NUMBER =      3390
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.06883360970239E-01, -7.40798587818914E-01)
-X( 2) = ( -5.45194504215232E-01,  5.75575929640863E-01)
-X( 3) = ( -6.08721857024746E-01, -4.46153868258570E-01)
-X( 4) = (  2.92541499136405E-01,  1.17159917137816E+00)
-
-X( 5) = (  3.55782650968130E-01, -1.01503974881344E-01)
-
-PATH NUMBER =      3391
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.08919274134855E-01, -1.07373757516302E+00)
-X( 2) = ( -3.87282805442698E-01,  2.03303318320000E-01)
-X( 3) = ( -9.24007254641396E-01, -3.15740536145085E-01)
-X( 4) = (  2.84658369390086E-01,  1.08375496810944E+00)
-
-X( 5) = (  3.03023447643596E-01, -1.23060623907315E-01)
-
-PATH NUMBER =      3392
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.96469818254907E-01, -1.33009229607225E+00)
-X( 2) = ( -2.70232041118176E-02,  1.96296364877986E-02)
-X( 3) = ( -1.24935795550267E+00, -4.18499674873995E-01)
-X( 4) = (  3.35084707097451E-01,  1.01139522620874E+00)
-
-X( 5) = (  2.70520666226849E-01, -1.58819394325334E-01)
-
-PATH NUMBER =      3393
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.31057545150679E-01, -1.38991152756780E+00)
-X( 2) = (  3.67014828475208E-01,  1.10497841179140E-01)
-X( 3) = ( -1.43253875080531E+00, -7.06349141393429E-01)
-X( 4) = (  4.20225468418905E-01,  9.88377873100350E-01)
-
-X( 5) = (  2.54875460491307E-01, -2.04494946408180E-01)
-
-PATH NUMBER =      3394
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.16594557423608E-01, -1.19312437215631E+00)
-X( 2) = (  6.17199773927734E-01,  2.99701301168357E-01)
-X( 3) = ( -1.46016031472242E+00, -1.26801964499378E+00)
-X( 4) = (  1.91542267164880E-01,  1.18791496170411E+00)
-
-X( 5) = (  1.86691168458635E-01, -3.19534098477605E-01)
-
-PATH NUMBER =      3395
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.32379530171093E-01, -8.80960385889478E-01)
-X( 2) = (  5.96136047735599E-01,  7.03532108794253E-01)
-X( 3) = ( -1.20849293968154E+00, -1.49840204771425E+00)
-X( 4) = (  2.28994473008490E-01,  1.26776532212885E+00)
-
-X( 5) = (  1.95900245459154E-01, -3.95988984911203E-01)
-
-PATH NUMBER =      3396
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.20420822578310E-01, -5.67403752997927E-01)
-X( 2) = (  3.20422857783101E-01,  9.99344952726188E-01)
-X( 3) = ( -8.67617591558589E-01, -1.51311653667206E+00)
-X( 4) = (  2.06357704867508E-01,  1.35300806088497E+00)
-
-X( 5) = (  2.79837971745816E-01, -4.73895134650224E-01)
-
-PATH NUMBER =      3397
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.33105158210356E-01, -3.99171106805417E-01)
-X( 2) = ( -8.09305301402039E-02,  1.04872571569485E+00)
-X( 3) = ( -5.97033634147810E-01, -1.30527803895051E+00)
-X( 4) = (  1.34223958134753E-01,  1.40375715314097E+00)
-
-X( 5) = (  4.31876440403825E-01, -4.30593221900358E-01)
-
-PATH NUMBER =      3398
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04870729582923E-01, -4.54980372163021E-01)
-X( 2) = ( -4.20126405278951E-01,  8.28568589901153E-01)
-X( 3) = ( -5.23350308327418E-01, -9.72136497501117E-01)
-X( 4) = (  4.63454145837777E-02,  1.39626653461693E+00)
-
-X( 5) = (  4.49244640733376E-01, -2.79595399113336E-01)
-
-PATH NUMBER =      3399
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.10697926229880E-01, -7.08717773559020E-01)
-X( 2) = ( -5.38451247913478E-01,  4.41887541277878E-01)
-X( 3) = ( -6.81044861147726E-01, -6.69572542023876E-01)
-X( 4) = ( -1.61585785966944E-02,  1.33404114896920E+00)
-
-X( 5) = (  3.69585600659774E-01, -2.09791200218407E-01)
-
-PATH NUMBER =      3400
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12733839394496E-01, -1.04165676090313E+00)
-X( 2) = ( -3.80539549140944E-01,  6.96149299570140E-02)
-X( 3) = ( -9.96330258764375E-01, -5.39159209910391E-01)
-X( 4) = ( -2.40417083430134E-02,  1.24619694570048E+00)
-
-X( 5) = (  2.97454871845859E-01, -2.04886600977527E-01)
-
-PATH NUMBER =      3401
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.97156164854515E-02, -1.29801148181235E+00)
-X( 2) = ( -2.02799478100640E-02, -1.14058751875187E-01)
-X( 3) = ( -1.32168095962565E+00, -6.41918348639302E-01)
-X( 4) = (  2.63846293643512E-02,  1.17383720379978E+00)
-
-X( 5) = (  2.45098493435850E-01, -2.26989637216438E-01)
-
-PATH NUMBER =      3402
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.27242979891037E-01, -1.35783071330790E+00)
-X( 2) = (  3.73758084776962E-01, -2.31905471838456E-02)
-X( 3) = ( -1.50486175492829E+00, -9.29767815158735E-01)
-X( 4) = (  1.11525390685805E-01,  1.15081985069139E+00)
-
-X( 5) = (  2.08020449318137E-01, -2.64845066805056E-01)
-
-PATH NUMBER =      3403
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.80352210148642E-01, -9.48489487204344E-01)
-X( 2) = (  5.93286410107645E-01, -7.40335933832777E-02)
-X( 3) = ( -8.53215183605739E-01, -1.38506071920399E+00)
-X( 4) = ( -3.96153720592618E-01,  1.02539686097655E+00)
-
-X( 5) = ( -4.53960363566317E-02, -4.16951650799725E-01)
-
-PATH NUMBER =      3404
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09613718289613E+00, -6.36325500937515E-01)
-X( 2) = (  5.72222683915511E-01,  3.29797214242620E-01)
-X( 3) = ( -6.01547808564855E-01, -1.61544312192447E+00)
-X( 4) = ( -3.58701514749008E-01,  1.10524722140130E+00)
-
-X( 5) = ( -1.32821106153721E-01, -4.44339010550389E-01)
-
-PATH NUMBER =      3405
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.84178475303344E-01, -3.22768868045963E-01)
-X( 2) = (  2.96509493963012E-01,  6.25610058174554E-01)
-X( 3) = ( -2.60672460441907E-01, -1.63015761088228E+00)
-X( 4) = ( -3.81338282889990E-01,  1.19048996015742E+00)
-
-X( 5) = ( -2.28490225453762E-01, -5.24848639021722E-01)
-
-PATH NUMBER =      3406
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.96862810935390E-01, -1.54536221853453E-01)
-X( 2) = ( -1.04843893960292E-01,  6.74990821143216E-01)
-X( 3) = (  9.91149696887209E-03, -1.42231911316072E+00)
-X( 4) = ( -4.53472029622745E-01,  1.24123905241342E+00)
-
-X( 5) = ( -2.80617625681673E-01, -7.28868849647607E-01)
-
-PATH NUMBER =      3407
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.68628382307956E-01, -2.10345487211056E-01)
-X( 2) = ( -4.44039769099039E-01,  4.54833695349520E-01)
-X( 3) = (  8.35948227892639E-02, -1.08917757171133E+00)
-X( 4) = ( -5.41350573173720E-01,  1.23374843388938E+00)
-
-X( 5) = ( -1.55992854276595E-02, -9.65263094376363E-01)
-
-PATH NUMBER =      3408
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.53059726495153E-01, -4.64082888607056E-01)
-X( 2) = ( -5.62364611733567E-01,  6.81526467262436E-02)
-X( 3) = ( -7.40997300310435E-02, -7.86613616234092E-01)
-X( 4) = ( -6.03854566354193E-01,  1.17152304824165E+00)
-
-X( 5) = (  2.62807231414538E-01, -7.41002136669894E-01)
-
-PATH NUMBER =      3409
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.51023813330537E-01, -7.97021875951163E-01)
-X( 2) = ( -4.04452912961033E-01, -3.04119964594619E-01)
-X( 3) = ( -3.89385127647693E-01, -6.56200284120607E-01)
-X( 4) = ( -6.11737696100511E-01,  1.08367884497293E+00)
-
-X( 5) = (  2.18263648221517E-01, -5.32571071262761E-01)
-
-PATH NUMBER =      3410
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.63473269210485E-01, -1.05337659686039E+00)
-X( 2) = ( -4.41933116301525E-02, -4.87793646426821E-01)
-X( 3) = ( -7.14735828508968E-01, -7.58959422849518E-01)
-X( 4) = ( -5.61311358393146E-01,  1.01131910307223E+00)
-
-X( 5) = (  1.24462208939269E-01, -4.48268104357775E-01)
-
-PATH NUMBER =      3411
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.91000632616071E-01, -1.11319582835594E+00)
-X( 2) = (  3.49844720956874E-01, -3.96925441735479E-01)
-X( 3) = ( -8.97916623811609E-01, -1.04680888936895E+00)
-X( 4) = ( -4.76170597071692E-01,  9.88301749963836E-01)
-
-X( 5) = (  3.75325082987870E-02, -4.18159825093770E-01)
-
-PATH NUMBER =      3412
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00019083653670E+00, -6.51232999808446E-01)
-X( 2) = (  7.26114725623561E-01, -9.06075273112235E-02)
-X( 3) = ( -6.45749499383314E-01, -1.49508121994154E+00)
-X( 4) = ( -6.09733045482898E-01,  7.49594384454823E-01)
-
-X( 5) = ( -1.83015068501286E-01, -4.52644998969013E-01)
-
-PATH NUMBER =      3413
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11597580928419E+00, -3.39069013541617E-01)
-X( 2) = (  7.05050999431427E-01,  3.13223280314674E-01)
-X( 3) = ( -3.94082124342431E-01, -1.72546362266202E+00)
-X( 4) = ( -5.72280839639288E-01,  8.29444744879565E-01)
-
-X( 5) = ( -2.95621962833664E-01, -4.18168697775646E-01)
-
-PATH NUMBER =      3414
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00401710169141E+00, -2.55123806500657E-02)
-X( 2) = (  4.29337809478927E-01,  6.09036124246608E-01)
-X( 3) = ( -5.32067762194819E-02, -1.74017811161983E+00)
-X( 4) = ( -5.94917607780271E-01,  9.14687483635689E-01)
-
-X( 5) = ( -4.41409020464912E-01, -4.13364938827421E-01)
-
-PATH NUMBER =      3415
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.16701437323453E-01,  1.42720265542444E-01)
-X( 2) = (  2.79844215556231E-02,  6.58416887215270E-01)
-X( 3) = (  2.17377181191297E-01, -1.53233961389828E+00)
-X( 4) = ( -6.67051354513026E-01,  9.65436575891689E-01)
-
-X( 5) = ( -6.62509342123696E-01, -4.94254968198811E-01)
-
-PATH NUMBER =      3416
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.88467008696019E-01,  8.69110001848417E-02)
-X( 2) = ( -3.11211453583124E-01,  4.38259761421574E-01)
-X( 3) = (  2.91060507011689E-01, -1.19919807244889E+00)
-X( 4) = ( -7.54929898064002E-01,  9.57945957367649E-01)
-
-X( 5) = ( -8.83958093006505E-01, -9.47540225532360E-01)
-
-PATH NUMBER =      3417
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.72898352883217E-01, -1.66826401211158E-01)
-X( 2) = ( -4.29536296217651E-01,  5.15787127982977E-02)
-X( 3) = (  1.33365954191382E-01, -8.96634116971645E-01)
-X( 4) = ( -8.17433891244473E-01,  8.95720571719917E-01)
-
-X( 5) = ( -1.57662574618729E-01, -1.35663011762023E+00)
-
-PATH NUMBER =      3418
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.70862439718600E-01, -4.99765388555265E-01)
-X( 2) = ( -2.71624597445118E-01, -3.20693898522565E-01)
-X( 3) = ( -1.81919443425267E-01, -7.66220784858160E-01)
-X( 4) = ( -8.25317020990792E-01,  8.07876368451199E-01)
-
-X( 5) = (  1.13606107584450E-01, -8.65194437656547E-01)
-
-PATH NUMBER =      3419
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.83311895598548E-01, -7.56120109464491E-01)
-X( 2) = (  8.86350038857632E-02, -5.04367580354766E-01)
-X( 3) = ( -5.07270144286543E-01, -8.68979923587070E-01)
-X( 4) = ( -7.74890683283427E-01,  7.35516626550497E-01)
-
-X( 5) = (  2.55065986731049E-02, -6.24073798065277E-01)
-
-PATH NUMBER =      3420
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.10839259004134E-01, -8.15939340960042E-01)
-X( 2) = (  4.82673036472789E-01, -4.13499375663425E-01)
-X( 3) = ( -6.90450939589183E-01, -1.15682939010650E+00)
-X( 4) = ( -6.89749921961973E-01,  7.12499273442104E-01)
-
-X( 5) = ( -8.01706850829625E-02, -5.13557458436190E-01)
-
-PATH NUMBER =      3421
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.24315319043368E-01, -4.10769296222304E-01)
-X( 2) = (  8.38520637986029E-01, -1.79235018681825E-02)
-X( 3) = ( -4.16101750161241E-01, -1.44600544190740E+00)
-X( 4) = ( -5.96061885851170E-01,  4.01031286192210E-01)
-
-X( 5) = ( -3.89491901092882E-01, -5.51153425641027E-01)
-
-PATH NUMBER =      3422
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.40100291790853E-01, -9.86053099554748E-02)
-X( 2) = (  8.17456911793896E-01,  3.85907305757715E-01)
-X( 3) = ( -1.64434375120357E-01, -1.67638784462788E+00)
-X( 4) = ( -5.58609680007559E-01,  4.80881646616952E-01)
-
-X( 5) = ( -5.29092514413682E-01, -3.94544557142774E-01)
-
-PATH NUMBER =      3423
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.28141584198070E-01,  2.14951322936076E-01)
-X( 2) = (  5.41743721841396E-01,  6.81720149689649E-01)
-X( 3) = (  1.76440973002591E-01, -1.69110233358568E+00)
-X( 4) = ( -5.81246448148542E-01,  5.66124385373075E-01)
-
-X( 5) = ( -6.92040846559441E-01, -2.36071540065547E-01)
-
-PATH NUMBER =      3424
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.40825919830116E-01,  3.83183969128586E-01)
-X( 2) = (  1.40390333918091E-01,  7.31100912658311E-01)
-X( 3) = (  4.47024930413371E-01, -1.48326383586413E+00)
-X( 4) = ( -6.53380194881297E-01,  6.16873477629076E-01)
-
-X( 5) = ( -9.44965280747774E-01, -3.09990645428492E-02)
-
-PATH NUMBER =      3425
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.12591491202683E-01,  3.27374703770983E-01)
-X( 2) = ( -1.98805541220655E-01,  5.10943786864615E-01)
-X( 3) = (  5.20708256233762E-01, -1.15012229441474E+00)
-X( 4) = ( -7.41258738432272E-01,  6.09382859105036E-01)
-
-X( 5) = ( -1.56481532983793E+00,  3.17345114242354E-01)
-
-PATH NUMBER =      3426
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.97716461012040E-03,  7.36373023749833E-02)
-X( 2) = ( -3.17130383855183E-01,  1.24262738241339E-01)
-X( 3) = (  3.63013703413454E-01, -8.47558338937499E-01)
-X( 4) = ( -8.03762731612744E-01,  5.47157473457305E-01)
-
-X( 5) = ( -5.53830599273867E+00, -1.24157561116881E+00)
-
-PATH NUMBER =      3427
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.01307777473668E-03, -2.59301684969123E-01)
-X( 2) = ( -1.59218685082649E-01, -2.48009873079524E-01)
-X( 3) = (  4.77283057968054E-02, -7.17145006824014E-01)
-X( 4) = ( -8.11645861359063E-01,  4.59313270188586E-01)
-
-X( 5) = (  3.02863920261534E-01, -2.19299493555870E+00)
-
-PATH NUMBER =      3428
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.07436378105212E-01, -5.15656405878349E-01)
-X( 2) = (  2.01040916248232E-01, -4.31683554911726E-01)
-X( 3) = ( -2.77622395064470E-01, -8.19904145552925E-01)
-X( 4) = ( -7.61219523651699E-01,  3.86953528287885E-01)
-
-X( 5) = ( -2.65142986738918E-02, -1.09711924045462E+00)
-
-PATH NUMBER =      3429
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.34963741510797E-01, -5.75475637373901E-01)
-X( 2) = (  5.95078948835258E-01, -3.40815350220384E-01)
-X( 3) = ( -4.60803190367111E-01, -1.10775361207236E+00)
-X( 4) = ( -6.76078762330244E-01,  3.63936175179491E-01)
-
-X( 5) = ( -2.37592484675348E-01, -7.49703308248901E-01)
-
-PATH NUMBER =      3430
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.35019766942414E-01, -3.39614015810256E-01)
-X( 2) = (  8.77908171548089E-01,  1.10008819648083E-01)
-X( 3) = ( -2.71726670050967E-01, -1.26079648706025E+00)
-X( 4) = ( -3.61537129227132E-01,  1.42804113713123E-01)
-
-X( 5) = ( -7.70675492107631E-01, -1.00686347370406E+00)
-
-PATH NUMBER =      3431
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.50804739689899E-01, -2.74500295434271E-02)
-X( 2) = (  8.56844445355955E-01,  5.13839627273981E-01)
-X( 3) = ( -2.00592950100829E-02, -1.49117888978073E+00)
-X( 4) = ( -3.24084923383522E-01,  2.22654474137865E-01)
-
-X( 5) = ( -1.03906421878445E+00, -3.98789492691120E-01)
-
-PATH NUMBER =      3432
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.38846032097116E-01,  2.86106603348124E-01)
-X( 2) = (  5.81131255403455E-01,  8.09652471205915E-01)
-X( 3) = (  3.20816053112865E-01, -1.50589337873854E+00)
-X( 4) = ( -3.46721691524504E-01,  3.07897212893988E-01)
-
-X( 5) = ( -1.06311220308771E+00,  1.64629393535808E-01)
-
-PATH NUMBER =      3433
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.51530367729162E-01,  4.54339249540634E-01)
-X( 2) = (  1.79777867480151E-01,  8.59033234174577E-01)
-X( 3) = (  5.91400010523644E-01, -1.29805488101698E+00)
-X( 4) = ( -4.18855438257259E-01,  3.58646305149989E-01)
-
-X( 5) = ( -8.89766145504184E-01,  7.17109140902544E-01)
-
-PATH NUMBER =      3434
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.67040608982715E-02,  3.98529984183030E-01)
-X( 2) = ( -1.59418007658596E-01,  6.38876108380880E-01)
-X( 3) = (  6.65083336344036E-01, -9.64913339567592E-01)
-X( 4) = ( -5.06733981808235E-01,  3.51155686625949E-01)
-
-X( 5) = ( -4.26343300830882E-01,  1.26859543732737E+00)
-
-PATH NUMBER =      3435
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.92272716711074E-01,  1.44792582787031E-01)
-X( 2) = ( -2.77742850293123E-01,  2.52195059757604E-01)
-X( 3) = (  5.07388783523728E-01, -6.62349384090351E-01)
-X( 4) = ( -5.69237974988707E-01,  2.88930300978218E-01)
-
-X( 5) = (  6.01589447890702E-01,  1.60909025660354E+00)
-
-PATH NUMBER =      3436
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.94308629875690E-01, -1.88146404557075E-01)
-X( 2) = ( -1.19831151520589E-01, -1.20077551563259E-01)
-X( 3) = (  1.92103385907079E-01, -5.31936051976866E-01)
-X( 4) = ( -5.77121104735026E-01,  2.01086097709499E-01)
-
-X( 5) = (  2.08312487932169E+00,  6.49032128877182E-01)
-
-PATH NUMBER =      3437
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.18591739957423E-02, -4.44501125466301E-01)
-X( 2) = (  2.40428449810292E-01, -3.03751233395460E-01)
-X( 3) = ( -1.33247314954196E-01, -6.34695190705777E-01)
-X( 4) = ( -5.26694767027661E-01,  1.28726355808797E-01)
-
-X( 5) = (  1.52368829680086E+00, -1.40907972726356E+00)
-
-PATH NUMBER =      3438
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.45668189409844E-01, -5.04320356961853E-01)
-X( 2) = (  6.34466482397318E-01, -2.12883028704118E-01)
-X( 3) = ( -3.16428110256837E-01, -9.22544657225211E-01)
-X( 4) = ( -4.41554005706206E-01,  1.05709002700405E-01)
-
-X( 5) = ( -2.11855843859607E-02, -1.59124933774984E+00)
-
-PATH NUMBER =      3439
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67668784223807E-01, -4.71061505079954E-01)
-X( 2) = (  8.25847461612377E-01,  2.33328482190734E-01)
-X( 3) = ( -2.80178963586375E-01, -1.02611568374133E+00)
-X( 4) = ( -1.58955156875119E-02,  9.57402308958754E-02)
-
-X( 5) = (  8.72242627598444E-01, -1.99648359460280E+00)
-
-PATH NUMBER =      3440
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.83453756971291E-01, -1.58897518813125E-01)
-X( 2) = (  8.04783735420243E-01,  6.37159289816631E-01)
-X( 3) = ( -2.85115885454906E-02, -1.25649808646181E+00)
-X( 4) = (  2.15566901560984E-02,  1.75590591320617E-01)
-
-X( 5) = ( -3.95783317530008E+00, -2.61882603922828E+00)
-
-PATH NUMBER =      3441
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.71495049378508E-01,  1.54659114078426E-01)
-X( 2) = (  5.29070545467744E-01,  9.32972133748565E-01)
-X( 3) = (  3.12363759577457E-01, -1.27121257541962E+00)
-X( 4) = ( -1.08007798488397E-03,  2.60833330076741E-01)
-
-X( 5) = ( -1.37120688219932E+00,  1.86728973864687E+00)
-
-PATH NUMBER =      3442
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.58206149894460E-02,  3.22891760270936E-01)
-X( 2) = (  1.27717157544439E-01,  9.82352896717227E-01)
-X( 3) = (  5.82947716988237E-01, -1.06337407769807E+00)
-X( 4) = ( -7.32138247176391E-02,  3.11582422332741E-01)
-
-X( 5) = ( -3.19479721850656E-02,  1.32410434060687E+00)
-
-PATH NUMBER =      3443
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.44055043616880E-01,  2.67082494913333E-01)
-X( 2) = ( -2.11478717594308E-01,  7.62195770923531E-01)
-X( 3) = (  6.56631042808629E-01, -7.30232536248675E-01)
-X( 4) = ( -1.61092368268614E-01,  3.04091803808701E-01)
-
-X( 5) = (  4.18391181502737E-01,  8.99559672330167E-01)
-
-PATH NUMBER =      3444
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.59623699429682E-01,  1.33450935173331E-02)
-X( 2) = ( -3.29803560228834E-01,  3.75514722300255E-01)
-X( 3) = (  4.98936489988320E-01, -4.27668580771435E-01)
-X( 4) = ( -2.23596361449086E-01,  2.41866418160970E-01)
-
-X( 5) = (  6.59029713063171E-01,  5.70817296230743E-01)
-
-PATH NUMBER =      3445
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.61659612594298E-01, -3.19593893826773E-01)
-X( 2) = ( -1.71891861456301E-01,  3.24211097939160E-03)
-X( 3) = (  1.83651092371671E-01, -2.97255248657950E-01)
-X( 4) = ( -2.31479491195405E-01,  1.54022214892251E-01)
-
-X( 5) = (  8.28531993318831E-01,  2.57439284353184E-01)
-
-PATH NUMBER =      3446
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.49210156714350E-01, -5.75948614736000E-01)
-X( 2) = (  1.88367739874580E-01, -1.80431570852810E-01)
-X( 3) = ( -1.41699608489604E-01, -4.00014387386861E-01)
-X( 4) = ( -1.81053153488041E-01,  8.16624729915498E-02)
-
-X( 5) = (  9.69566895868784E-01, -1.15828448720800E-01)
-
-PATH NUMBER =      3447
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.16827933087641E-02, -6.35767846231551E-01)
-X( 2) = (  5.82405772461605E-01, -8.95633661614682E-02)
-X( 3) = ( -3.24880403792244E-01, -6.87863853906294E-01)
-X( 4) = ( -9.59123921665862E-02,  5.86451198831570E-02)
-
-X( 5) = (  1.07806954988711E+00, -6.95916384386035E-01)
-
-PATH NUMBER =      3448
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.47358866976785E-01, -7.43606022925990E-01)
-X( 2) = (  7.06698292948155E-01,  2.94332845110678E-01)
-X( 3) = ( -4.37503708685468E-01, -8.51772788010172E-01)
-X( 4) = (  2.79133402413859E-01,  2.81861351567451E-01)
-
-X( 5) = (  7.13988079584075E-01, -5.97310867905798E-01)
-
-PATH NUMBER =      3449
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.63143839724270E-01, -4.31442036659160E-01)
-X( 2) = (  6.85634566756021E-01,  6.98163652736576E-01)
-X( 3) = ( -1.85836333644584E-01, -1.08215519073065E+00)
-X( 4) = (  3.16585608257469E-01,  3.61711711992193E-01)
-
-X( 5) = (  1.27626797418236E+00, -1.05784594941367E+00)
-
-PATH NUMBER =      3450
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.51185132131487E-01, -1.17885403767609E-01)
-X( 2) = (  4.09921376803522E-01,  9.93976496668510E-01)
-X( 3) = (  1.55039014478364E-01, -1.09686967968846E+00)
-X( 4) = (  2.93948840116486E-01,  4.46954450748317E-01)
-
-X( 5) = (  2.49371538764318E+00,  5.13610645495828E-01)
-
-PATH NUMBER =      3451
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.36130532236467E-01,  5.03472424249011E-02)
-X( 2) = (  8.56798888021674E-03,  1.04335725963717E+00)
-X( 3) = (  4.25622971889144E-01, -8.89031181966907E-01)
-X( 4) = (  2.21815093383731E-01,  4.97703543004318E-01)
-
-X( 5) = (  9.98127378356411E-01,  7.80084765388224E-01)
-
-PATH NUMBER =      3452
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.64364960863901E-01, -5.46202293270211E-03)
-X( 2) = ( -3.30627886258530E-01,  8.23200133843475E-01)
-X( 3) = (  4.99306297709535E-01, -5.55889640517515E-01)
-X( 4) = (  1.33936549832756E-01,  4.90212924480277E-01)
-
-X( 5) = (  6.86761696936169E-01,  4.15988931051586E-01)
-
-PATH NUMBER =      3453
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.79933616676703E-01, -2.59199424328702E-01)
-X( 2) = ( -4.48952728893056E-01,  4.36519085220199E-01)
-X( 3) = (  3.41611744889228E-01, -2.53325685040274E-01)
-X( 4) = (  7.14325566522837E-02,  4.27987538832546E-01)
-
-X( 5) = (  6.01884972378891E-01,  1.92581780506575E-01)
-
-PATH NUMBER =      3454
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.81969529841320E-01, -5.92138411672808E-01)
-X( 2) = ( -2.91041030120523E-01,  6.42464738993360E-02)
-X( 3) = (  2.63263472725787E-02, -1.22912352926789E-01)
-X( 4) = (  6.35494269059646E-02,  3.40143335563827E-01)
-
-X( 5) = (  5.73409598890084E-01,  2.41477290015457E-02)
-
-PATH NUMBER =      3455
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.69520073961372E-01, -8.48493132582034E-01)
-X( 2) = (  6.92185712103575E-02, -1.19427207932865E-01)
-X( 3) = ( -2.99024353588697E-01, -2.25671491655700E-01)
-X( 4) = (  1.13975764613330E-01,  2.67783593663125E-01)
-
-X( 5) = (  5.71779981029719E-01, -1.34631511693065E-01)
-
-PATH NUMBER =      3456
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.41992710555786E-01, -9.08312364077586E-01)
-X( 2) = (  4.63256603797383E-01, -2.85590032415235E-02)
-X( 3) = ( -4.82205148891337E-01, -5.13520958175134E-01)
-X( 4) = (  1.99116525934784E-01,  2.44766240554733E-01)
-
-X( 5) = (  6.00950556551717E-01, -3.20839549658134E-01)
-
-PATH NUMBER =      3457
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.30384362577023E-01, -1.02972096045328E+00)
-X( 2) = (  5.76211885768921E-01,  2.64477289009701E-01)
-X( 3) = ( -6.70086908646599E-01, -8.19344778384835E-01)
-X( 4) = (  3.85502315416155E-01,  6.14079334859774E-01)
-
-X( 5) = (  3.79207186701156E-01, -4.34010510442806E-01)
-
-PATH NUMBER =      3458
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.46169335324508E-01, -7.17556974186454E-01)
-X( 2) = (  5.55148159576786E-01,  6.68308096635599E-01)
-X( 3) = ( -4.18419533605716E-01, -1.04972718110532E+00)
-X( 4) = (  4.22954521259765E-01,  6.93929695284516E-01)
-
-X( 5) = (  4.83898220534570E-01, -6.20098275473112E-01)
-
-PATH NUMBER =      3459
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.34210627731725E-01, -4.04000341294904E-01)
-X( 2) = (  2.79434969624287E-01,  9.64120940567533E-01)
-X( 3) = ( -7.75441854827674E-02, -1.06444167006312E+00)
-X( 4) = (  4.00317753118782E-01,  7.79172434040639E-01)
-
-X( 5) = (  8.97166844158391E-01, -6.87319745509807E-01)
-
-PATH NUMBER =      3460
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.31050366362291E-02, -2.35767695102393E-01)
-X( 2) = ( -1.21918418299017E-01,  1.01350170353619E+00)
-X( 3) = (  1.93039771928012E-01, -8.56603172341570E-01)
-X( 4) = (  3.28184006386027E-01,  8.29921526296640E-01)
-
-X( 5) = (  1.04385309089843E+00, -1.45781401338900E-01)
-
-PATH NUMBER =      3461
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.81339465263663E-01, -2.91576960459997E-01)
-X( 2) = ( -4.61114293437764E-01,  7.93344577742499E-01)
-X( 3) = (  2.66723097748404E-01, -5.23461630892178E-01)
-X( 4) = (  2.40305462835052E-01,  8.22430907772600E-01)
-
-X( 5) = (  7.22794050330390E-01,  1.45963221085371E-02)
-
-PATH NUMBER =      3462
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.96908121076465E-01, -5.45314361855996E-01)
-X( 2) = ( -5.79439136072291E-01,  4.06663529119223E-01)
-X( 3) = (  1.09028544928096E-01, -2.20897675414938E-01)
-X( 4) = (  1.77801469654580E-01,  7.60205522124869E-01)
-
-X( 5) = (  5.45005203802943E-01, -4.03469185931235E-02)
-
-PATH NUMBER =      3463
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.98944034241082E-01, -8.78253349200103E-01)
-X( 2) = ( -4.21527437299758E-01,  3.43909177983595E-02)
-X( 3) = ( -2.06256852688553E-01, -9.04843433014525E-02)
-X( 4) = (  1.69918339908261E-01,  6.72361318856150E-01)
-
-X( 5) = (  4.54064931432070E-01, -1.19995665397850E-01)
-
-PATH NUMBER =      3464
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.86494578361134E-01, -1.13460807010933E+00)
-X( 2) = ( -6.12678359688771E-02, -1.49282764033842E-01)
-X( 3) = ( -5.31607553549828E-01, -1.93243482030363E-01)
-X( 4) = (  2.20344677615626E-01,  6.00001576955448E-01)
-
-X( 5) = (  4.01805602457152E-01, -2.04997460917466E-01)
-
-PATH NUMBER =      3465
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.89672149555475E-02, -1.19442730160488E+00)
-X( 2) = (  3.32770196618149E-01, -5.84145593425000E-02)
-X( 3) = ( -7.14788348852469E-01, -4.81092948549797E-01)
-X( 4) = (  3.05485438937080E-01,  5.76984223847055E-01)
-
-X( 5) = (  3.73882507918403E-01, -3.03412406364488E-01)
-
-PATH NUMBER =      3466
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.77896718907567E-01, -1.19552995857948E+00)
-X( 2) = (  4.95444280188717E-01,  1.57731560394997E-01)
-X( 3) = ( -8.69100299333618E-01, -9.44005080966200E-01)
-X( 4) = (  2.53440026766815E-01,  9.36945694198753E-01)
-
-X( 5) = (  2.01190592404495E-01, -4.03878841736782E-01)
-
-PATH NUMBER =      3467
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.93681691655053E-01, -8.83365972312655E-01)
-X( 2) = (  4.74380553996583E-01,  5.61562368020894E-01)
-X( 3) = ( -6.17432924292733E-01, -1.17438748368668E+00)
-X( 4) = (  2.90892232610425E-01,  1.01679605462349E+00)
-
-X( 5) = (  1.95512862310997E-01, -5.22256748818457E-01)
-
-PATH NUMBER =      3468
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.81722984062270E-01, -5.69809339421104E-01)
-X( 2) = (  1.98667364044084E-01,  8.57375211952829E-01)
-X( 3) = ( -2.76557576169785E-01, -1.18910197264449E+00)
-X( 4) = (  2.68255464469443E-01,  1.10203879337962E+00)
-
-X( 5) = (  3.08729564579433E-01, -6.83443515814023E-01)
-
-PATH NUMBER =      3469
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.94407319694316E-01, -4.01576693228594E-01)
-X( 2) = ( -2.02686023879221E-01,  9.06755974921490E-01)
-X( 3) = ( -5.97361875900552E-03, -9.81263474922934E-01)
-X( 4) = (  1.96121717736688E-01,  1.15278788563562E+00)
-
-X( 5) = (  6.18312655186033E-01, -6.35710067533469E-01)
-
-PATH NUMBER =      3470
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.33827108933118E-01, -4.57385958586197E-01)
-X( 2) = ( -5.41881899017968E-01,  6.86598849127794E-01)
-X( 3) = (  6.77097070613860E-02, -6.48121933473543E-01)
-X( 4) = (  1.08243174185712E-01,  1.14529726711158E+00)
-
-X( 5) = (  6.36018254295645E-01, -3.35817576369720E-01)
-
-PATH NUMBER =      3471
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.49395764745920E-01, -7.11123359982196E-01)
-X( 2) = ( -6.60206741652495E-01,  2.99917800504518E-01)
-X( 3) = ( -8.99848457589217E-02, -3.45557977996302E-01)
-X( 4) = (  4.57391810052403E-02,  1.08307188146385E+00)
-
-X( 5) = (  4.84007004510905E-01, -2.35199484281980E-01)
-
-PATH NUMBER =      3472
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.51431677910537E-01, -1.04406234732630E+00)
-X( 2) = ( -5.02295042879961E-01, -7.23548108163452E-02)
-X( 3) = ( -4.05270243375571E-01, -2.15144645882817E-01)
-X( 4) = (  3.78560512589213E-02,  9.95227678195129E-01)
-
-X( 5) = (  3.72047936160016E-01, -2.38472057278913E-01)
-
-PATH NUMBER =      3473
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.38982222030589E-01, -1.30041706823553E+00)
-X( 2) = ( -1.42035441549081E-01, -2.56028492648547E-01)
-X( 3) = ( -7.30620944236846E-01, -3.17903784611727E-01)
-X( 4) = (  8.82823889662862E-02,  9.22867936294427E-01)
-
-X( 5) = (  2.95903636402195E-01, -2.73694730759965E-01)
-
-PATH NUMBER =      3474
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.88545141374997E-01, -1.36023629973108E+00)
-X( 2) = (  2.52002591037945E-01, -1.65160287957205E-01)
-X( 3) = ( -9.13801739539487E-01, -6.05753251131161E-01)
-X( 4) = (  1.73423150287741E-01,  8.99850583186035E-01)
-
-X( 5) = (  2.40291354454527E-01, -3.27009873114195E-01)
-
-PATH NUMBER =      3475
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.74082153647926E-01, -1.16344914431959E+00)
-X( 2) = (  5.02187536490471E-01,  2.40431720320112E-02)
-X( 3) = ( -9.41423303456597E-01, -1.16742375473151E+00)
-X( 4) = ( -5.52600509662840E-02,  1.09938767178979E+00)
-
-X( 5) = (  7.29588300864818E-02, -4.02793680125934E-01)
-
-PATH NUMBER =      3476
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.89867126395411E-01, -8.51285158052761E-01)
-X( 2) = (  4.81123810298337E-01,  4.27873979657908E-01)
-X( 3) = ( -6.89755928415713E-01, -1.39780615745199E+00)
-X( 4) = ( -1.78078451226740E-02,  1.17923803221453E+00)
-
-X( 5) = (  1.72021030707495E-02, -4.75688573735897E-01)
-
-PATH NUMBER =      3477
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.77908418802628E-01, -5.37728525161210E-01)
-X( 2) = (  2.05410620345838E-01,  7.23686823589843E-01)
-X( 3) = ( -3.48880580292765E-01, -1.41252064640979E+00)
-X( 4) = ( -4.04446132636561E-02,  1.26448077097066E+00)
-
-X( 5) = ( -1.43631114149841E-03, -6.11515212766574E-01)
-
-PATH NUMBER =      3478
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.90592754434674E-01, -3.69495878968700E-01)
-X( 2) = ( -1.95942767577467E-01,  7.73067586558505E-01)
-X( 3) = ( -7.82966228819853E-02, -1.20468214868824E+00)
-X( 4) = ( -1.12578359996412E-01,  1.31522986322666E+00)
-
-X( 5) = (  1.49306395300469E-01, -7.85689321719927E-01)
-
-PATH NUMBER =      3479
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.62358325807240E-01, -4.25305144326303E-01)
-X( 2) = ( -5.35138642716214E-01,  5.52910460764809E-01)
-X( 3) = ( -4.61329706159383E-03, -8.71540607238849E-01)
-X( 4) = ( -2.00456903547386E-01,  1.30773924470262E+00)
-
-X( 5) = (  4.22624604599156E-01, -6.67755452831650E-01)
-
-PATH NUMBER =      3480
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.32103300055619E-02, -6.79042545722302E-01)
-X( 2) = ( -6.53463485350741E-01,  1.66229412141533E-01)
-X( 3) = ( -1.62307849881901E-01, -5.68976651761608E-01)
-X( 4) = ( -2.62960896727859E-01,  1.24551385905488E+00)
-
-X( 5) = (  4.03862859644280E-01, -4.44895285249526E-01)
-
-PATH NUMBER =      3481
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.52462431701781E-02, -1.01198153306641E+00)
-X( 2) = ( -4.95551786578208E-01, -2.06043199179331E-01)
-X( 3) = ( -4.77593247498551E-01, -4.38563319648123E-01)
-X( 4) = ( -2.70844026474178E-01,  1.15766965578617E+00)
-
-X( 5) = (  2.99035574095367E-01, -3.62908893010500E-01)
-
-PATH NUMBER =      3482
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.57203212709770E-01, -1.26833625397564E+00)
-X( 2) = ( -1.35292185247327E-01, -3.89716881011532E-01)
-X( 3) = ( -8.02943948359826E-01, -5.41322458377033E-01)
-X( 4) = ( -2.20417688766813E-01,  1.08530991388546E+00)
-
-X( 5) = (  2.10061897957693E-01, -3.48524699163837E-01)
-
-PATH NUMBER =      3483
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.84730576115355E-01, -1.32815548547119E+00)
-X( 2) = (  2.58745847339699E-01, -2.98848676320191E-01)
-X( 3) = ( -9.86124743662466E-01, -8.29171924896467E-01)
-X( 4) = ( -1.35276927445358E-01,  1.06229256077707E+00)
-
-X( 5) = (  1.37132201917775E-01, -3.63989104397896E-01)
-
-PATH NUMBER =      3484
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00531539501648E+00, -8.88804629258082E-01)
-X( 2) = (  6.82371554646364E-01, -3.59128412595748E-01)
-X( 3) = ( -5.20501370531380E-01, -9.74562072940475E-01)
-X( 4) = ( -5.28311019869828E-01,  7.98939550336681E-01)
-
-X( 5) = ( -2.32059846233105E-01, -4.18284202823070E-01)
-
-PATH NUMBER =      3485
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12110036776397E+00, -5.76640642991253E-01)
-X( 2) = (  6.61307828454230E-01,  4.47023950301496E-02)
-X( 3) = ( -2.68833995490496E-01, -1.20494447566096E+00)
-X( 4) = ( -4.90858814026218E-01,  8.78789910761423E-01)
-
-X( 5) = ( -3.26385748160953E-01, -3.62040902644874E-01)
-
-PATH NUMBER =      3486
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00914166017118E+00, -2.63084010099702E-01)
-X( 2) = (  3.85594638501730E-01,  3.40515238962084E-01)
-X( 3) = (  7.20413526324522E-02, -1.21965896461876E+00)
-X( 4) = ( -5.13495582167200E-01,  9.64032649517546E-01)
-
-X( 5) = ( -4.49272064795733E-01, -3.27514199075183E-01)
-
-PATH NUMBER =      3487
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.21825995803229E-01, -9.48513639071920E-02)
-X( 2) = ( -1.57587494215739E-02,  3.89896001930746E-01)
-X( 3) = (  3.42625310043231E-01, -1.01182046689721E+00)
-X( 4) = ( -5.85629328899956E-01,  1.01478174177355E+00)
-
-X( 5) = ( -6.38397850512093E-01, -3.42606865723061E-01)
-
-PATH NUMBER =      3488
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.93591567175796E-01, -1.50660629264795E-01)
-X( 2) = ( -3.54954624560321E-01,  1.69738876137049E-01)
-X( 3) = (  4.16308635863623E-01, -6.78678925447817E-01)
-X( 4) = ( -6.73507872450931E-01,  1.00729112324951E+00)
-
-X( 5) = ( -9.19122875576036E-01, -5.86907435711988E-01)
-
-PATH NUMBER =      3489
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.78022911362993E-01, -4.04398030660794E-01)
-X( 2) = ( -4.73279467194848E-01, -2.16942172486227E-01)
-X( 3) = (  2.58614083043316E-01, -3.76114969970576E-01)
-X( 4) = ( -7.36011865631403E-01,  9.45065737601776E-01)
-
-X( 5) = ( -6.12256547872314E-01, -1.21449954803977E+00)
-
-PATH NUMBER =      3490
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.75986998198377E-01, -7.37337018004901E-01)
-X( 2) = ( -3.15367768422314E-01, -5.89214783807089E-01)
-X( 3) = ( -5.66713145733335E-02, -2.45701637857092E-01)
-X( 4) = ( -7.43894995377722E-01,  8.57221534333056E-01)
-
-X( 5) = ( -8.49652747994072E-02, -9.30810256541967E-01)
-
-PATH NUMBER =      3491
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.88436454078325E-01, -9.93691738914127E-01)
-X( 2) = (  4.48918329085662E-02, -7.72888465639291E-01)
-X( 3) = ( -3.82022015434609E-01, -3.48460776586002E-01)
-X( 4) = ( -6.93468657670357E-01,  7.84861792432355E-01)
-
-X( 5) = ( -7.63857927606097E-02, -6.45002526979284E-01)
-
-PATH NUMBER =      3492
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.15963817483911E-01, -1.05351097040968E+00)
-X( 2) = (  4.38929865495592E-01, -6.82020260947949E-01)
-X( 3) = ( -5.65202810737250E-01, -6.36310243105437E-01)
-X( 4) = ( -6.08327896348903E-01,  7.61844439323963E-01)
-
-X( 5) = ( -1.49049638736746E-01, -5.02175062701841E-01)
-
-PATH NUMBER =      3493
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02515402140454E+00, -5.91548141862184E-01)
-X( 2) = (  8.15199870162280E-01, -3.75702346523693E-01)
-X( 3) = ( -3.13035686308955E-01, -1.08458257367803E+00)
-X( 4) = ( -7.41890344760109E-01,  5.23137073814950E-01)
-
-X( 5) = ( -3.66087204667134E-01, -3.25908949038789E-01)
-
-PATH NUMBER =      3494
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14093899415203E+00, -2.79384155595355E-01)
-X( 2) = (  7.94136143970145E-01,  2.81284611022041E-02)
-X( 3) = ( -6.13683112680707E-02, -1.31496497639851E+00)
-X( 4) = ( -7.04438138916498E-01,  6.02987434239692E-01)
-
-X( 5) = ( -4.04645692740783E-01, -2.26090204930993E-01)
-
-PATH NUMBER =      3495
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02898028655925E+00,  3.41724772961962E-02)
-X( 2) = (  5.18422954017646E-01,  3.23941305034138E-01)
-X( 3) = (  2.79507036854878E-01, -1.32967946535631E+00)
-X( 4) = ( -7.27074907057481E-01,  6.88230172995815E-01)
-
-X( 5) = ( -4.67445906129883E-01, -1.40034575798960E-01)
-
-PATH NUMBER =      3496
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.41664622191292E-01,  2.02405123488706E-01)
-X( 2) = (  1.17069566094341E-01,  3.73322068002800E-01)
-X( 3) = (  5.50090994265657E-01, -1.12184096763476E+00)
-X( 4) = ( -7.99208653790237E-01,  7.38979265251816E-01)
-
-X( 5) = ( -5.73111937796102E-01, -6.01825055235392E-02)
-
-PATH NUMBER =      3497
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.13430193563858E-01,  1.46595858131103E-01)
-X( 2) = ( -2.22126309044405E-01,  1.53164942209103E-01)
-X( 3) = (  6.23774320086048E-01, -7.88699426185369E-01)
-X( 4) = ( -8.87087197341211E-01,  7.31488646727776E-01)
-
-X( 5) = ( -7.79475025697531E-01, -1.34139872968362E-02)
-
-PATH NUMBER =      3498
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.97861537751056E-01, -1.07141543264896E-01)
-X( 2) = ( -3.40451151678932E-01, -2.33516106414172E-01)
-X( 3) = (  4.66079767265741E-01, -4.86135470708129E-01)
-X( 4) = ( -9.49591190521684E-01,  6.69263261080045E-01)
-
-X( 5) = ( -1.13455787591435E+00, -2.49805748911491E-01)
-
-PATH NUMBER =      3499
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.95825624586440E-01, -4.40080530609003E-01)
-X( 2) = ( -1.82539452906399E-01, -6.05788717735035E-01)
-X( 3) = (  1.50794369649092E-01, -3.55722138594644E-01)
-X( 4) = ( -9.57474320268003E-01,  5.81419057811326E-01)
-
-X( 5) = ( -8.41535443834513E-01, -8.23628202250845E-01)
-
-PATH NUMBER =      3500
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.08275080466388E-01, -6.96435251518229E-01)
-X( 2) = (  1.77720148424482E-01, -7.89462399567237E-01)
-X( 3) = ( -1.74556331212184E-01, -4.58481277323555E-01)
-X( 4) = ( -9.07047982560638E-01,  5.09059315910624E-01)
-
-X( 5) = ( -4.32951424300907E-01, -6.62831233544675E-01)
-
-PATH NUMBER =      3501
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.35802443871973E-01, -7.56254483013781E-01)
-X( 2) = (  5.71758181011508E-01, -6.98594194875895E-01)
-X( 3) = ( -3.57737126514824E-01, -7.46330743842989E-01)
-X( 4) = ( -8.21907221239183E-01,  4.86041962802231E-01)
-
-X( 5) = ( -3.56357888361200E-01, -4.59862533544884E-01)
-
-PATH NUMBER =      3502
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.49278503911207E-01, -3.51084438276043E-01)
-X( 2) = (  9.27605782524748E-01, -3.03018321080653E-01)
-X( 3) = ( -8.33879370868818E-02, -1.03550679564388E+00)
-X( 4) = ( -7.28219185128380E-01,  1.74573975552337E-01)
-
-X( 5) = ( -5.29637368388037E-01, -2.19532754592258E-01)
-
-PATH NUMBER =      3503
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.65063476658692E-01, -3.89204520092135E-02)
-X( 2) = (  9.06542056332614E-01,  1.00812486545245E-01)
-X( 3) = (  1.68279437954002E-01, -1.26588919836436E+00)
-X( 4) = ( -6.90766979284769E-01,  2.54424335977079E-01)
-
-X( 5) = ( -4.90725099338601E-01, -9.05224334587273E-02)
-
-PATH NUMBER =      3504
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.53104769065909E-01,  2.74636180882337E-01)
-X( 2) = (  6.30828866380115E-01,  3.96625330477179E-01)
-X( 3) = (  5.09154786076950E-01, -1.28060368732217E+00)
-X( 4) = ( -7.13403747425752E-01,  3.39667074733203E-01)
-
-X( 5) = ( -4.86512629945081E-01,  2.38833128993730E-02)
-
-PATH NUMBER =      3505
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.65789104697955E-01,  4.42868827074848E-01)
-X( 2) = (  2.29475478456810E-01,  4.46006093445841E-01)
-X( 3) = (  7.79738743487730E-01, -1.07276518960062E+00)
-X( 4) = ( -7.85537494158507E-01,  3.90416166989203E-01)
-
-X( 5) = ( -5.11434685174278E-01,  1.43152053079210E-01)
-
-PATH NUMBER =      3506
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.37554676070521E-01,  3.87059561717244E-01)
-X( 2) = ( -1.09720396681937E-01,  2.25848967652144E-01)
-X( 3) = (  8.53422069308121E-01, -7.39623648151224E-01)
-X( 4) = ( -8.73416037709483E-01,  3.82925548465163E-01)
-
-X( 5) = ( -5.90187103114321E-01,  2.87218052017213E-01)
-
-PATH NUMBER =      3507
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.19860202577189E-02,  1.33322160321245E-01)
-X( 2) = ( -2.28045239316464E-01, -1.60832080971132E-01)
-X( 3) = (  6.95727516487813E-01, -4.37059692673983E-01)
-X( 4) = ( -9.35920030889955E-01,  3.20700162817432E-01)
-
-X( 5) = ( -8.32369316143133E-01,  4.51739701856849E-01)
-
-PATH NUMBER =      3508
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.99501070931027E-02, -1.99616827022862E-01)
-X( 2) = ( -7.01335405439307E-02, -5.33104692291994E-01)
-X( 3) = (  3.80442118871164E-01, -3.06646360560498E-01)
-X( 4) = ( -9.43803160636274E-01,  2.32855959548713E-01)
-
-X( 5) = ( -1.41391929807031E+00,  1.92931350830959E-01)
-
-PATH NUMBER =      3509
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.32399562973051E-01, -4.55971547932088E-01)
-X( 2) = (  2.90126060786950E-01, -7.16778374124195E-01)
-X( 3) = (  5.50914180098890E-02, -4.09405499289409E-01)
-X( 4) = ( -8.93376822928909E-01,  1.60496217648011E-01)
-
-X( 5) = ( -1.04945463736728E+00, -4.97311522174921E-01)
-
-PATH NUMBER =      3510
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.59926926378637E-01, -5.15790779427639E-01)
-X( 2) = (  6.84164093373977E-01, -6.25910169432854E-01)
-X( 3) = ( -1.28089377292752E-01, -6.97254965808843E-01)
-X( 4) = ( -8.08236061607454E-01,  1.37478864539618E-01)
-
-X( 5) = ( -6.51955964783413E-01, -3.83030932490835E-01)
-
-PATH NUMBER =      3511
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.59982951810254E-01, -2.79929157863995E-01)
-X( 2) = (  9.66993316086808E-01, -1.75085999564387E-01)
-X( 3) = (  6.09871430233919E-02, -8.50297840796734E-01)
-X( 4) = ( -4.93694428504343E-01, -8.36531969267496E-02)
-
-X( 5) = ( -8.05669302805317E-01, -5.48196096488029E-02)
-
-PATH NUMBER =      3512
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.75767924557739E-01,  3.22348284028347E-02)
-X( 2) = (  9.45929589894674E-01,  2.28744808061511E-01)
-X( 3) = (  3.12654518064276E-01, -1.08068024351721E+00)
-X( 4) = ( -4.56242222660732E-01, -3.80283650200795E-03)
-
-X( 5) = ( -6.15239517409675E-01,  8.49625507757031E-02)
-
-PATH NUMBER =      3513
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.63809216964956E-01,  3.45791461294386E-01)
-X( 2) = (  6.70216399942175E-01,  5.24557651993445E-01)
-X( 3) = (  6.53529866187225E-01, -1.09539473247502E+00)
-X( 4) = ( -4.78878990801715E-01,  8.14399022541155E-02)
-
-X( 5) = ( -5.11649137804900E-01,  2.09109375217997E-01)
-
-PATH NUMBER =      3514
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.76493552597001E-01,  5.14024107486896E-01)
-X( 2) = (  2.68863012018870E-01,  5.73938414962106E-01)
-X( 3) = (  9.24113823598004E-01, -8.87556234753468E-01)
-X( 4) = ( -5.51012737534470E-01,  1.32188994510116E-01)
-
-X( 5) = ( -4.41308077060430E-01,  3.35044074442179E-01)
-
-PATH NUMBER =      3515
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.17408760304322E-02,  4.58214842129292E-01)
-X( 2) = ( -7.03328631198771E-02,  3.53781289168410E-01)
-X( 3) = (  9.97797149418395E-01, -5.54414693304076E-01)
-X( 4) = ( -6.38891281085445E-01,  1.24698375986076E-01)
-
-X( 5) = ( -3.89552255470049E-01,  4.89990574983301E-01)
-
-PATH NUMBER =      3516
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.67309531843235E-01,  2.04477440733292E-01)
-X( 2) = ( -1.88657705754404E-01, -3.28997594548661E-02)
-X( 3) = (  8.40102596598087E-01, -2.51850737826835E-01)
-X( 4) = ( -7.01395274265917E-01,  6.24729903383450E-02)
-
-X( 5) = ( -3.71256278614562E-01,  7.31031131814218E-01)
-
-PATH NUMBER =      3517
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.69345445007851E-01, -1.28461546610814E-01)
-X( 2) = ( -3.07460069818708E-02, -4.05172370775729E-01)
-X( 3) = (  5.24817198981438E-01, -1.21437405713350E-01)
-X( 4) = ( -7.09278404012236E-01, -2.53712129303739E-02)
-
-X( 5) = ( -5.66930998114173E-01,  1.20760195829230E+00)
-
-PATH NUMBER =      3518
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.68959891279028E-02, -3.84816267520040E-01)
-X( 2) = (  3.29513594349010E-01, -5.88846052607930E-01)
-X( 3) = (  1.99466498120163E-01, -2.24196544442262E-01)
-X( 4) = ( -6.58852066304871E-01, -9.77309548310754E-02)
-
-X( 5) = ( -1.93309349426514E+00,  1.03319488089493E+00)
-
-PATH NUMBER =      3519
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.70631374277683E-01, -4.44635499015591E-01)
-X( 2) = (  7.23551626936036E-01, -4.97977847916588E-01)
-X( 3) = (  1.62857028175223E-02, -5.12046010961696E-01)
-X( 4) = ( -5.73711304983417E-01, -1.20748307939468E-01)
-
-X( 5) = ( -1.29167210946225E+00, -1.45508963194792E-01)
-
-PATH NUMBER =      3520
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.92631969091646E-01, -4.11376647133693E-01)
-X( 2) = (  9.14932606151096E-01, -5.17663370217362E-02)
-X( 3) = (  5.25348494879843E-02, -6.15617037477817E-01)
-X( 4) = ( -1.48052814964722E-01, -1.30717079743997E-01)
-
-X( 5) = ( -1.67167117542092E+00,  3.55162594642716E-01)
-
-PATH NUMBER =      3521
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.08416941839131E-01, -9.92126608668634E-02)
-X( 2) = (  8.93868879958961E-01,  3.52064470604161E-01)
-X( 3) = (  3.04202224528868E-01, -8.45999440198298E-01)
-X( 4) = ( -1.10600609121112E-01, -5.08667193192554E-02)
-
-X( 5) = ( -8.87678787082375E-01,  4.05740138891115E-01)
-
-PATH NUMBER =      3522
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.96458234246348E-01,  2.14343972024687E-01)
-X( 2) = (  6.18155690006463E-01,  6.47877314536095E-01)
-X( 3) = (  6.45077572651817E-01, -8.60713929156105E-01)
-X( 4) = ( -1.33237377262094E-01,  3.43760194368679E-02)
-
-X( 5) = ( -5.57151856790947E-01,  4.90242679442144E-01)
-
-PATH NUMBER =      3523
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.14256987839358E-03,  3.82576618217198E-01)
-X( 2) = (  2.16802302083158E-01,  6.97258077504757E-01)
-X( 3) = (  9.15661530062596E-01, -6.52875431434551E-01)
-X( 4) = ( -2.05371123994849E-01,  8.51251116928685E-02)
-
-X( 5) = ( -3.39354860144635E-01,  5.68411571615819E-01)
-
-PATH NUMBER =      3524
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.19091858749040E-01,  3.26767352859594E-01)
-X( 2) = ( -1.22393573055589E-01,  4.77100951711061E-01)
-X( 3) = (  9.89344855882987E-01, -3.19733889985160E-01)
-X( 4) = ( -2.93249667545824E-01,  7.76344931688283E-02)
-
-X( 5) = ( -1.48451161054522E-01,  6.52993117050183E-01)
-
-PATH NUMBER =      3525
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.34660514561842E-01,  7.30299514635945E-02)
-X( 2) = ( -2.40718415690116E-01,  9.04199030877845E-02)
-X( 3) = (  8.31650303062679E-01, -1.71699345079186E-02)
-X( 4) = ( -3.55753660726296E-01,  1.54091075210974E-02)
-
-X( 5) = (  6.58053065417104E-02,  7.67676963854482E-01)
-
-PATH NUMBER =      3526
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.36696427726459E-01, -2.59909035880512E-01)
-X( 2) = ( -8.28067169175827E-02, -2.81852708233078E-01)
-X( 3) = (  5.16364905446030E-01,  1.13243397605566E-01)
-X( 4) = ( -3.63636790472616E-01, -7.24350957476216E-02)
-
-X( 5) = (  3.82616632308915E-01,  9.81855269231470E-01)
-
-PATH NUMBER =      3527
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.24246971846511E-01, -5.16263756789738E-01)
-X( 2) = (  2.77452884413298E-01, -4.65526390065280E-01)
-X( 3) = (  1.91014204584755E-01,  1.04842588766551E-02)
-X( 4) = ( -3.13210452765251E-01, -1.44794837648323E-01)
-
-X( 5) = (  1.06429154679389E+00,  1.71723549157754E+00)
-
-PATH NUMBER =      3528
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.28039155907514E-03, -5.76082988285289E-01)
-X( 2) = (  6.71490917000324E-01, -3.74658185373938E-01)
-X( 3) = (  7.83340928211452E-03, -2.77365207642779E-01)
-X( 4) = ( -2.28069691443796E-01, -1.67812190756716E-01)
-
-X( 5) = ( -4.12612779193700E+00,  4.86598675808267E+00)
-
-PATH NUMBER =      3529
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.72322051844624E-01, -6.83921164979728E-01)
-X( 2) = (  7.95783437486873E-01,  9.23802589820831E-03)
-X( 3) = ( -1.04789895611109E-01, -4.41274141746657E-01)
-X( 4) = (  1.46976103136648E-01,  5.54040409275788E-02)
-
-X( 5) = (  2.58500875064011E+00, -5.60699125847540E+00)
-
-PATH NUMBER =      3530
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.88107024592110E-01, -3.71757178712898E-01)
-X( 2) = (  7.74719711294739E-01,  4.13068833524105E-01)
-X( 3) = (  1.46877479429775E-01, -6.71656544467137E-01)
-X( 4) = (  1.84428308980258E-01,  1.35254401352320E-01)
-
-X( 5) = ( -2.65647852531031E+00,  1.43210342108692E+00)
-
-PATH NUMBER =      3531
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.76148316999326E-01, -5.82005458213475E-02)
-X( 2) = (  4.99006521342240E-01,  7.08881677456040E-01)
-X( 3) = (  4.87752827552724E-01, -6.86371033424944E-01)
-X( 4) = (  1.61791540839276E-01,  2.20497140108444E-01)
-
-X( 5) = ( -7.08645719132238E-01,  1.18561657132605E+00)
-
-PATH NUMBER =      3532
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.11167347368628E-01,  1.10032100371163E-01)
-X( 2) = (  9.76531334189356E-02,  7.58262440424701E-01)
-X( 3) = (  7.58336784963503E-01, -4.78532535703391E-01)
-X( 4) = (  8.96577941065205E-02,  2.71246232364445E-01)
-
-X( 5) = ( -1.24749292291770E-01,  9.56201424734885E-01)
-
-PATH NUMBER =      3533
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.39401775996061E-01,  5.42228350135592E-02)
-X( 2) = ( -2.41542741719811E-01,  5.38105314631005E-01)
-X( 3) = (  8.32020110783894E-01, -1.45390994253999E-01)
-X( 4) = (  1.77925055554537E-03,  2.63755613840404E-01)
-
-X( 5) = (  2.05321627964527E-01,  7.88680723872511E-01)
-
-PATH NUMBER =      3534
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.54970431808864E-01, -1.99514566382440E-01)
-X( 2) = ( -3.59867584354338E-01,  1.51424266007729E-01)
-X( 3) = (  6.74325557963587E-01,  1.57172961223242E-01)
-X( 4) = ( -6.07247426249266E-02,  2.01530228192673E-01)
-
-X( 5) = (  4.65459538210572E-01,  6.34911229309824E-01)
-
-PATH NUMBER =      3535
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.57006344973480E-01, -5.32453553726547E-01)
-X( 2) = ( -2.01955885581805E-01, -2.20848345313134E-01)
-X( 3) = (  3.59040160346938E-01,  2.87586293336727E-01)
-X( 4) = ( -6.86078723712456E-02,  1.13686024923954E-01)
-
-X( 5) = (  7.30207157692476E-01,  4.56418323690782E-01)
-
-PATH NUMBER =      3536
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.44556889093532E-01, -7.88808274635773E-01)
-X( 2) = (  1.58303715749076E-01, -4.04522027145335E-01)
-X( 3) = (  3.36894594856622E-02,  1.84827154607815E-01)
-X( 4) = ( -1.81815346638809E-02,  4.13262830232529E-02)
-
-X( 5) = (  1.07922878307795E+00,  1.82122116148035E-01)
-
-PATH NUMBER =      3537
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.17029525687946E-01, -8.48627506131324E-01)
-X( 2) = (  5.52341748336102E-01, -3.13653822453993E-01)
-X( 3) = ( -1.49491335816978E-01, -1.03022311911618E-01)
-X( 4) = (  6.69592266575737E-02,  1.83089299148602E-02)
-
-X( 5) = (  1.72387379127401E+00, -4.77166661447929E-01)
-
-PATH NUMBER =      3538
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.55347547444863E-01, -9.70036102507022E-01)
-X( 2) = (  6.65297030307639E-01, -2.06175302027684E-02)
-X( 3) = ( -3.37373095572240E-01, -4.08846132121321E-01)
-X( 4) = (  2.53345016138944E-01,  3.87622024219901E-01)
-
-X( 5) = (  5.25969975490027E-01, -1.04293752391807E+00)
-
-PATH NUMBER =      3539
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.71132520192348E-01, -6.57872116240192E-01)
-X( 2) = (  6.44233304115505E-01,  3.83213277423129E-01)
-X( 3) = ( -8.57057205313561E-02, -6.39228534841801E-01)
-X( 4) = (  2.90797221982554E-01,  4.67472384644643E-01)
-
-X( 5) = (  1.22546356380757E-01, -2.16656241226991E+00)
-
-PATH NUMBER =      3540
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.59173812599564E-01, -3.44315483348642E-01)
-X( 2) = (  3.68520114163006E-01,  6.79026121355063E-01)
-X( 3) = (  2.55169627591592E-01, -6.53943023799608E-01)
-X( 4) = (  2.68160453841572E-01,  5.52715123400766E-01)
-
-X( 5) = ( -1.85002568515616E+01,  1.41429396803912E+00)
-
-PATH NUMBER =      3541
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.81418517683896E-02, -1.76082837156131E-01)
-X( 2) = ( -3.28332737602985E-02,  7.28406884323725E-01)
-X( 3) = (  5.25753585002371E-01, -4.46104526078054E-01)
-X( 4) = (  1.96026707108817E-01,  6.03464215656767E-01)
-
-X( 5) = (  9.05977567833459E-01,  2.02863742660598E+00)
-
-PATH NUMBER =      3542
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.56376280395823E-01, -2.31892102513735E-01)
-X( 2) = ( -3.72029148899045E-01,  5.08249758530028E-01)
-X( 3) = (  5.99436910822763E-01, -1.12962984628662E-01)
-X( 4) = (  1.08148163557842E-01,  5.95973597132727E-01)
-
-X( 5) = (  8.73062017318099E-01,  7.94089181448504E-01)
-
-PATH NUMBER =      3543
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.71944936208626E-01, -4.85629503909734E-01)
-X( 2) = ( -4.90353991533572E-01,  1.21568709906753E-01)
-X( 3) = (  4.41742358002455E-01,  1.89600970848578E-01)
-X( 4) = (  4.56441703773697E-02,  5.33748211484996E-01)
-
-X( 5) = (  8.17125239784772E-01,  3.11269980267530E-01)
-
-PATH NUMBER =      3544
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.73980849373242E-01, -8.18568491253841E-01)
-X( 2) = ( -3.32442292761039E-01, -2.50703901414111E-01)
-X( 3) = (  1.26456960385806E-01,  3.20014302962063E-01)
-X( 4) = (  3.77610406310504E-02,  4.45904008216277E-01)
-
-X( 5) = (  7.67789356242047E-01, -1.06752103657035E-03)
-
-PATH NUMBER =      3545
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.61531393493294E-01, -1.07492321216307E+00)
-X( 2) = (  2.78173085698418E-02, -4.34377583246312E-01)
-X( 3) = ( -1.98893740475470E-01,  2.17255164233152E-01)
-X( 4) = (  8.81873783384150E-02,  3.73544266315576E-01)
-
-X( 5) = (  7.16186752192888E-01, -2.73453283460964E-01)
-
-PATH NUMBER =      3546
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.40040300877076E-02, -1.13474244365862E+00)
-X( 2) = (  4.21855341156868E-01, -3.43509378554970E-01)
-X( 3) = ( -3.82074535778110E-01, -7.05943022862821E-02)
-X( 4) = (  1.73328139659869E-01,  3.50526913207183E-01)
-
-X( 5) = (  6.48339350458841E-01, -5.80188395933611E-01)
-
-PATH NUMBER =      3547
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.02859903775407E-01, -1.13584510063322E+00)
-X( 2) = (  5.84529424727435E-01, -1.27363258817473E-01)
-X( 3) = ( -5.36386486259258E-01, -5.33506434702685E-01)
-X( 4) = (  1.21282727489604E-01,  7.10488383558880E-01)
-
-X( 5) = (  1.08855573711291E-01, -6.76186073143187E-01)
-
-PATH NUMBER =      3548
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.18644876522892E-01, -8.23681114366393E-01)
-X( 2) = (  5.63465698535301E-01,  2.76467548808424E-01)
-X( 3) = ( -2.84719111218374E-01, -7.63888837423165E-01)
-X( 4) = (  1.58734933333215E-01,  7.90338743983622E-01)
-
-X( 5) = ( -9.73065013371178E-02, -8.68450384571756E-01)
-
-PATH NUMBER =      3549
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.06686168930109E-01, -5.10124481474842E-01)
-X( 2) = (  2.87752508582802E-01,  5.72280392740358E-01)
-X( 3) = (  5.61562369045743E-02, -7.78603326380972E-01)
-X( 4) = (  1.36098165192232E-01,  8.75581482739745E-01)
-
-X( 5) = ( -4.17825985515913E-01, -1.35725195645238E+00)
-
-PATH NUMBER =      3550
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.19370504562155E-01, -3.41891835282332E-01)
-X( 2) = ( -1.13600879340502E-01,  6.21661155709020E-01)
-X( 3) = (  3.26740194315354E-01, -5.70764828659419E-01)
-X( 4) = (  6.39644184594771E-02,  9.26330574995746E-01)
-
-X( 5) = (  4.19549957968661E-01, -3.71002678391290E+00)
-
-PATH NUMBER =      3551
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.08863924065278E-01, -3.97701100639935E-01)
-X( 2) = ( -4.52796754479249E-01,  4.01504029915324E-01)
-X( 3) = (  4.00423520135745E-01, -2.37623287210027E-01)
-X( 4) = ( -2.39141250914982E-02,  9.18839956471706E-01)
-
-X( 5) = (  2.00978594976171E+00, -4.54177693648936E-01)
-
-PATH NUMBER =      3552
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.24432579878081E-01, -6.51438502035935E-01)
-X( 2) = ( -5.71121597113776E-01,  1.48229812920478E-02)
-X( 3) = (  2.42728967315437E-01,  6.49406682672139E-02)
-X( 4) = ( -8.64181182719703E-02,  8.56614570823975E-01)
-
-X( 5) = (  1.00510004919808E+00, -2.96496616254953E-01)
-
-PATH NUMBER =      3553
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.26468493042697E-01, -9.84377489380041E-01)
-X( 2) = ( -4.13209898341243E-01, -3.57449630028815E-01)
-X( 3) = ( -7.25564303012116E-02,  1.95354000380699E-01)
-X( 4) = ( -9.43012480182893E-02,  7.68770367555256E-01)
-
-X( 5) = (  6.45095285723493E-01, -3.81175720663206E-01)
-
-PATH NUMBER =      3554
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.14019037162749E-01, -1.24073221028927E+00)
-X( 2) = ( -5.29502970103619E-02, -5.41123311861017E-01)
-X( 3) = ( -3.97907131162487E-01,  9.25948616517877E-02)
-X( 4) = ( -4.38749103109246E-02,  6.96410625654554E-01)
-
-X( 5) = (  4.36603530612932E-01, -4.68255382131592E-01)
-
-PATH NUMBER =      3555
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.13508326242837E-01, -1.30055144178482E+00)
-X( 2) = (  3.41087735576664E-01, -4.50255107169675E-01)
-X( 3) = ( -5.81087926465127E-01, -1.95254604867646E-01)
-X( 4) = (  4.12658510105301E-02,  6.73393272546161E-01)
-
-X( 5) = (  2.72692083064279E-01, -5.59914586499147E-01)
-
-PATH NUMBER =      3556
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.99045338515765E-01, -1.10376428637333E+00)
-X( 2) = (  5.91272681029189E-01, -2.61051647180459E-01)
-X( 3) = ( -6.08709490382238E-01, -7.56925108467990E-01)
-X( 4) = ( -1.87417350243494E-01,  8.72930361149917E-01)
-
-X( 5) = ( -8.98780726239794E-02, -5.21690754758209E-01)
-
-PATH NUMBER =      3557
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.14830311263251E-01, -7.91600300106500E-01)
-X( 2) = (  5.70208954837055E-01,  1.42779160445439E-01)
-X( 3) = ( -3.57042115341354E-01, -9.87307511188471E-01)
-X( 4) = ( -1.49965144399884E-01,  9.52780721574659E-01)
-
-X( 5) = ( -2.35547148872819E-01, -5.39266180864991E-01)
-
-PATH NUMBER =      3558
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.02871603670467E-01, -4.78043667214949E-01)
-X( 2) = (  2.94495764884556E-01,  4.38592004377373E-01)
-X( 3) = ( -1.61667672184055E-02, -1.00202200014628E+00)
-X( 4) = ( -1.72601912540867E-01,  1.03802346033078E+00)
-
-X( 5) = ( -4.28790357596518E-01, -6.16736015440509E-01)
-
-PATH NUMBER =      3559
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.15555939302514E-01, -3.09811021022438E-01)
-X( 2) = ( -1.06857623038749E-01,  4.87972767346035E-01)
-X( 3) = (  2.54417190192374E-01, -7.94183502424724E-01)
-X( 4) = ( -2.44735659273622E-01,  1.08877255258678E+00)
-
-X( 5) = ( -7.02464824485707E-01, -9.22222707342697E-01)
-
-PATH NUMBER =      3560
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87321510675080E-01, -3.65620286380042E-01)
-X( 2) = ( -4.46053498177496E-01,  2.67815641552338E-01)
-X( 3) = (  3.28100516012765E-01, -4.61041960975333E-01)
-X( 4) = ( -3.32614202824597E-01,  1.08128193406274E+00)
-
-X( 5) = ( -2.79472306000348E-01, -1.85527557136497E+00)
-
-PATH NUMBER =      3561
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.82471451377225E-02, -6.19357687776041E-01)
-X( 2) = ( -5.64378340812022E-01, -1.18865407070938E-01)
-X( 3) = (  1.70405963192457E-01, -1.58478005498092E-01)
-X( 4) = ( -3.95118196005069E-01,  1.01905654841501E+00)
-
-X( 5) = (  5.96608560900547E-01, -1.13573514068616E+00)
-
-PATH NUMBER =      3562
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.02830583023389E-02, -9.52296675120148E-01)
-X( 2) = ( -4.06466642039489E-01, -4.91138018391801E-01)
-X( 3) = ( -1.44879434424192E-01, -2.80646733846071E-02)
-X( 4) = ( -4.03001325751388E-01,  9.31212345146293E-01)
-
-X( 5) = (  3.81394844461853E-01, -7.03017357424538E-01)
-
-PATH NUMBER =      3563
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.82166397577609E-01, -1.20865139602937E+00)
-X( 2) = ( -4.62070407086084E-02, -6.74811700224002E-01)
-X( 3) = ( -4.70230135285467E-01, -1.30823812113518E-01)
-X( 4) = ( -3.52574988044023E-01,  8.58852603245591E-01)
-
-X( 5) = (  1.89506647897910E-01, -5.77864673083684E-01)
-
-PATH NUMBER =      3564
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.09693760983195E-01, -1.26847062752493E+00)
-X( 2) = (  3.47830991878418E-01, -5.83943495532660E-01)
-X( 3) = ( -6.53410930588108E-01, -4.18673278632952E-01)
-X( 4) = ( -2.67434226722569E-01,  8.35835250137199E-01)
-
-X( 5) = (  4.29882113072876E-02, -5.33116240799816E-01)
-
-PATH NUMBER =      3565
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.86073616893283E-01, -8.27037349558641E-01)
-X( 2) = (  9.33870151960300E-01, -5.20260887498847E-01)
-X( 3) = ( -5.29491246488126E-01, -4.46237549446684E-01)
-X( 4) = ( -4.83985431196502E-01,  5.40514111412312E-01)
-
-X( 5) = ( -5.16877155190926E-01, -3.84756081980137E-01)
-
-PATH NUMBER =      3566
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10185858964077E+00, -5.14873363291812E-01)
-X( 2) = (  9.12806425768166E-01, -1.16430079872950E-01)
-X( 3) = ( -2.77823871447242E-01, -6.76619952167165E-01)
-X( 4) = ( -4.46533225352891E-01,  6.20364471837053E-01)
-
-X( 5) = ( -5.41773647572183E-01, -2.10159980517417E-01)
-
-PATH NUMBER =      3567
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.89899882047985E-01, -2.01316730400261E-01)
-X( 2) = (  6.37093235815667E-01,  1.79382764058984E-01)
-X( 3) = (  6.30514766757060E-02, -6.91334441124972E-01)
-X( 4) = ( -4.69169993493873E-01,  7.05607210593177E-01)
-
-X( 5) = ( -5.88586022652122E-01, -5.52739174842907E-02)
-
-PATH NUMBER =      3568
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.02584217680031E-01, -3.30840842077501E-02)
-X( 2) = (  2.35739847892362E-01,  2.28763527027646E-01)
-X( 3) = (  3.33635434086485E-01, -4.83495943403418E-01)
-X( 4) = ( -5.41303740226629E-01,  7.56356302849177E-01)
-
-X( 5) = ( -6.71317143183694E-01,  1.15397097038578E-01)
-
-PATH NUMBER =      3569
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.74349789052598E-01, -8.88933495653538E-02)
-X( 2) = ( -1.03456027246385E-01,  8.60640123394977E-03)
-X( 3) = (  4.07318759906877E-01, -1.50354401954027E-01)
-X( 4) = ( -6.29182283777604E-01,  7.48865684325137E-01)
-
-X( 5) = ( -8.55191888236194E-01,  3.47567053178293E-01)
-
-PATH NUMBER =      3570
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.58781133239795E-01, -3.42630750961353E-01)
-X( 2) = ( -2.21780869880912E-01, -3.78074647389326E-01)
-X( 3) = (  2.49624207086569E-01,  1.52209553523214E-01)
-X( 4) = ( -6.91686276958076E-01,  6.86640298677406E-01)
-
-X( 5) = ( -1.49609104198761E+00,  6.52178612494940E-01)
-
-PATH NUMBER =      3571
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.56745220075179E-01, -6.75569738305460E-01)
-X( 2) = ( -6.38691711083785E-02, -7.50347258710189E-01)
-X( 3) = ( -6.56611905300798E-02,  2.82622885636699E-01)
-X( 4) = ( -6.99569406704395E-01,  5.98796095408687E-01)
-
-X( 5) = ( -2.43876494848622E+00, -1.22010362823334E+00)
-
-PATH NUMBER =      3572
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.69194675955127E-01, -9.31924459214686E-01)
-X( 2) = (  2.96390430222502E-01, -9.34020940542391E-01)
-X( 3) = ( -3.91011891391355E-01,  1.79863746907788E-01)
-X( 4) = ( -6.49143068997030E-01,  5.26436353507986E-01)
-
-X( 5) = ( -7.30885951239238E-01, -1.11390974741015E+00)
-
-PATH NUMBER =      3573
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.96722039360713E-01, -9.91743690710237E-01)
-X( 2) = (  6.90428462809529E-01, -8.43152735851049E-01)
-X( 3) = ( -5.74192686693996E-01, -1.07985719611646E-01)
-X( 4) = ( -5.64002307675576E-01,  5.03419000399593E-01)
-
-X( 5) = ( -5.29535376863011E-01, -6.35484219929450E-01)
-
-PATH NUMBER =      3574
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00591224328135E+00, -5.29780862162743E-01)
-X( 2) = (  1.06669846747622E+00, -5.36834821426793E-01)
-X( 3) = ( -3.22025562265701E-01, -5.56258050184236E-01)
-X( 4) = ( -6.97564756086782E-01,  2.64711634890580E-01)
-
-X( 5) = ( -5.33994375485077E-01, -1.38549763710535E-01)
-
-PATH NUMBER =      3575
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12169721602883E+00, -2.17616875895914E-01)
-X( 2) = (  1.04563474128408E+00, -1.33004013800896E-01)
-X( 3) = ( -7.03581872248176E-02, -7.86640452904717E-01)
-X( 4) = ( -6.60112550243171E-01,  3.44561995315322E-01)
-
-X( 5) = ( -4.70628454243116E-01, -3.35961963299214E-02)
-
-PATH NUMBER =      3576
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00973850843605E+00,  9.59397569956370E-02)
-X( 2) = (  7.69921551331583E-01,  1.62808830131039E-01)
-X( 3) = (  2.70517160898131E-01, -8.01354941862524E-01)
-X( 4) = ( -6.82749318384154E-01,  4.29804734071446E-01)
-
-X( 5) = ( -4.46718430455695E-01,  6.37930657698193E-02)
-
-PATH NUMBER =      3577
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.22422844068095E-01,  2.64172403188147E-01)
-X( 2) = (  3.68568163408278E-01,  2.12189593099700E-01)
-X( 3) = (  5.41101118308910E-01, -5.93516444140971E-01)
-X( 4) = ( -7.54883065116909E-01,  4.80553826327446E-01)
-
-X( 5) = ( -4.50126071351502E-01,  1.65680220596743E-01)
-
-PATH NUMBER =      3578
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.94188415440661E-01,  2.08363137830544E-01)
-X( 2) = (  2.93722882695309E-02, -7.96753269399606E-03)
-X( 3) = (  6.14784444129302E-01, -2.60374902691579E-01)
-X( 4) = ( -8.42761608667885E-01,  4.73063207803406E-01)
-
-X( 5) = ( -4.94026423402117E-01,  2.87067903498482E-01)
-
-PATH NUMBER =      3579
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.78619759627858E-01, -4.53742635654555E-02)
-X( 2) = ( -8.89525543649960E-02, -3.94648581317272E-01)
-X( 3) = (  4.57089891308994E-01,  4.21890527856617E-02)
-X( 4) = ( -9.05265601848356E-01,  4.10837822155675E-01)
-
-X( 5) = ( -6.45058639383058E-01,  4.31276063243171E-01)
-
-PATH NUMBER =      3580
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.76583846463242E-01, -3.78313250909562E-01)
-X( 2) = (  6.89591444075369E-02, -7.66921192638135E-01)
-X( 3) = (  1.41804493692345E-01,  1.72602384899147E-01)
-X( 4) = ( -9.13148731594675E-01,  3.22993618886956E-01)
-
-X( 5) = ( -1.05216939300248E+00,  3.86088804394141E-01)
-
-PATH NUMBER =      3581
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.89033302343190E-01, -6.34667971818788E-01)
-X( 2) = (  4.29218745738418E-01, -9.50594874470336E-01)
-X( 3) = ( -1.83546207168930E-01,  6.98432461702358E-02)
-X( 4) = ( -8.62722393887311E-01,  2.50633876986255E-01)
-
-X( 5) = ( -1.05497050240658E+00, -1.78741279162756E-01)
-
-PATH NUMBER =      3582
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.16560665748776E-01, -6.94487203314339E-01)
-X( 2) = (  8.23256778325444E-01, -8.59726669778994E-01)
-X( 3) = ( -3.66727002471571E-01, -2.18006220349198E-01)
-X( 4) = ( -7.77581632565856E-01,  2.27616523877862E-01)
-
-X( 5) = ( -6.91330316900044E-01, -2.46298410851324E-01)
-
-PATH NUMBER =      3583
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.30036725788009E-01, -2.89317158576601E-01)
-X( 2) = (  1.17910437983868E+00, -4.64150795983752E-01)
-X( 3) = ( -9.23778130436281E-02, -5.07182272150091E-01)
-X( 4) = ( -6.83893596455053E-01, -8.38514633720326E-02)
-
-X( 5) = ( -5.34312234966485E-01,  6.77386999261664E-02)
-
-PATH NUMBER =      3584
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.45821698535495E-01,  2.28468276902283E-02)
-X( 2) = (  1.15804065364655E+00, -6.03199883578545E-02)
-X( 3) = (  1.59289561997256E-01, -7.37564674870571E-01)
-X( 4) = ( -6.46441390611443E-01, -4.00110294729092E-03)
-
-X( 5) = ( -4.28661167112781E-01,  1.04728022688291E-01)
-
-PATH NUMBER =      3585
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.33862990942711E-01,  3.36403460581779E-01)
-X( 2) = (  8.82327463694051E-01,  2.35492855574080E-01)
-X( 3) = (  5.00164910120204E-01, -7.52279163828378E-01)
-X( 4) = ( -6.69078158752425E-01,  8.12416358088328E-02)
-
-X( 5) = ( -3.67463236634664E-01,  1.61411642050096E-01)
-
-PATH NUMBER =      3586
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.46547326574757E-01,  5.04636106774289E-01)
-X( 2) = (  4.80974075770746E-01,  2.84873618542742E-01)
-X( 3) = (  7.70748867530983E-01, -5.44440666106825E-01)
-X( 4) = ( -7.41211905485180E-01,  1.31990728064833E-01)
-
-X( 5) = ( -3.31663343887800E-01,  2.28620047408291E-01)
-
-PATH NUMBER =      3587
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.18312897947324E-01,  4.48826841416685E-01)
-X( 2) = (  1.41778200631999E-01,  6.47164927490448E-02)
-X( 3) = (  8.44432193351374E-01, -2.11299124657433E-01)
-X( 4) = ( -8.29090449036155E-01,  1.24500109540793E-01)
-
-X( 5) = ( -3.18796990974087E-01,  3.12310414002008E-01)
-
-PATH NUMBER =      3588
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.74424213452107E-03,  1.95089440020686E-01)
-X( 2) = (  2.34533579974724E-02, -3.21964555874231E-01)
-X( 3) = (  6.86737640531067E-01,  9.12648308198076E-02)
-X( 4) = ( -8.91594442216627E-01,  6.22747238930623E-02)
-
-X( 5) = ( -3.49352469142557E-01,  4.23609374439035E-01)
-
-PATH NUMBER =      3589
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.08328969904629E-04, -1.37849547323421E-01)
-X( 2) = (  1.81365056770005E-01, -6.94237167195094E-01)
-X( 3) = (  3.71452242914418E-01,  2.21678162933292E-01)
-X( 4) = ( -8.99477571962947E-01, -2.55694793756564E-02)
-
-X( 5) = ( -5.00573961016344E-01,  5.39045917569590E-01)
-
-PATH NUMBER =      3590
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.13157784849853E-01, -3.94204268232647E-01)
-X( 2) = (  5.41624658100886E-01, -8.77910849027295E-01)
-X( 3) = (  4.61015420531427E-02,  1.18919024204381E-01)
-X( 4) = ( -8.49051234255582E-01, -9.79292212763581E-02)
-
-X( 5) = ( -7.75159224045255E-01,  4.09261834662603E-01)
-
-PATH NUMBER =      3591
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.40685148255439E-01, -4.54023499728198E-01)
-X( 2) = (  9.35662690687913E-01, -7.87042644335954E-01)
-X( 3) = ( -1.37079253249498E-01, -1.68930442315052E-01)
-X( 4) = ( -7.63910472934128E-01, -1.20946574384751E-01)
-
-X( 5) = ( -7.09198235851585E-01,  1.19735600922752E-01)
-
-PATH NUMBER =      3592
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.40741173687056E-01, -2.18161878164554E-01)
-X( 2) = (  1.21849191340074E+00, -3.36218474467487E-01)
-X( 3) = (  5.19972670666456E-02, -3.21973317302943E-01)
-X( 4) = ( -4.49368839831015E-01, -3.42078635851119E-01)
-
-X( 5) = ( -5.20347823200362E-01,  2.90064078382198E-01)
-
-PATH NUMBER =      3593
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.56526146434541E-01,  9.40021081022756E-02)
-X( 2) = (  1.19742818720861E+00,  6.76123331584109E-02)
-X( 3) = (  3.03664642107529E-01, -5.52355720023423E-01)
-X( 4) = ( -4.11916633987405E-01, -2.62228275426377E-01)
-
-X( 5) = ( -3.97650465705376E-01,  2.44305331898683E-01)
-
-PATH NUMBER =      3594
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.44567438841758E-01,  4.07558740993826E-01)
-X( 2) = (  9.21714997256110E-01,  3.63425177090345E-01)
-X( 3) = (  6.44539990230477E-01, -5.67070208981230E-01)
-X( 4) = ( -4.34553402128387E-01, -1.76985536670254E-01)
-
-X( 5) = ( -3.10050871291459E-01,  2.58046575155839E-01)
-
-PATH NUMBER =      3595
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.57251774473804E-01,  5.75791387186337E-01)
-X( 2) = (  5.20361609332806E-01,  4.12805940059007E-01)
-X( 3) = (  9.15123947641257E-01, -3.59231711259677E-01)
-X( 4) = ( -5.06687148861142E-01, -1.26236444414253E-01)
-
-X( 5) = ( -2.47002158513622E-01,  2.95057978029021E-01)
-
-PATH NUMBER =      3596
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.09826541536297E-02,  5.19982121828733E-01)
-X( 2) = (  1.81165734194059E-01,  1.92648814265310E-01)
-X( 3) = (  9.88807273461648E-01, -2.60901698102859E-02)
-X( 4) = ( -5.94565692412118E-01, -1.33727062938293E-01)
-
-X( 5) = ( -1.99788319666272E-01,  3.50992811981003E-01)
-
-PATH NUMBER =      3597
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.86551309966432E-01,  2.66244720432734E-01)
-X( 2) = (  6.28408915595324E-02, -1.94032234357965E-01)
-X( 3) = (  8.31112720641340E-01,  2.76473785666955E-01)
-X( 4) = ( -6.57069685592590E-01, -1.95952448586024E-01)
-
-X( 5) = ( -1.71383791132600E-01,  4.35335176719779E-01)
-
-PATH NUMBER =      3598
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.88587223131049E-01, -6.66942669113728E-02)
-X( 2) = (  2.20752590332065E-01, -5.66304845678828E-01)
-X( 3) = (  5.15827323024692E-01,  4.06887117780440E-01)
-X( 4) = ( -6.64952815338909E-01, -2.83796651854743E-01)
-
-X( 5) = ( -1.96314982036448E-01,  5.64696345775291E-01)
-
-PATH NUMBER =      3599
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.61377672511007E-02, -3.23048987820599E-01)
-X( 2) = (  5.81012191662946E-01, -7.49978527511030E-01)
-X( 3) = (  1.90476622163416E-01,  3.04127979051529E-01)
-X( 4) = ( -6.14526477631544E-01, -3.56156393755445E-01)
-
-X( 5) = ( -3.84328954899142E-01,  6.77778249651891E-01)
-
-PATH NUMBER =      3600
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.51389596154485E-01, -3.82868219316150E-01)
-X( 2) = (  9.75050224249972E-01, -6.59110322819688E-01)
-X( 3) = (  7.29582686077598E-03,  1.62785125320951E-02)
-X( 4) = ( -5.29385716310090E-01, -3.79173746863837E-01)
-
-X( 5) = ( -6.01305126096418E-01,  4.92588526751498E-01)
-
-PATH NUMBER =      3601
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.73390190968448E-01, -3.49609367434252E-01)
-X( 2) = (  1.16643120346503E+00, -2.12898811924836E-01)
-X( 3) = (  4.35449735312377E-02, -8.72925139840264E-02)
-X( 4) = ( -1.03727226291395E-01, -3.89142518668367E-01)
-
-X( 5) = ( -4.74790602280017E-01,  6.04809050129415E-01)
-
-PATH NUMBER =      3602
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.89175163715933E-01, -3.74453811674225E-02)
-X( 2) = (  1.14536747727290E+00,  1.90931995701061E-01)
-X( 3) = (  2.95212348572122E-01, -3.17674916704507E-01)
-X( 4) = ( -6.62750204477842E-02, -3.09292158243625E-01)
-
-X( 5) = ( -3.73417395915432E-01,  4.26338567758987E-01)
-
-PATH NUMBER =      3603
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.77216456123149E-01,  2.76111251724128E-01)
-X( 2) = (  8.69654287320399E-01,  4.86744839632996E-01)
-X( 3) = (  6.36087696695070E-01, -3.32389405662314E-01)
-X( 4) = ( -8.89117885887666E-02, -2.24049419487502E-01)
-
-X( 5) = ( -2.61383592690734E-01,  3.76933901226408E-01)
-
-PATH NUMBER =      3604
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.00992082448043E-02,  4.44343897916639E-01)
-X( 2) = (  4.68300899397094E-01,  5.36125602601658E-01)
-X( 3) = (  9.06671654105849E-01, -1.24550907940761E-01)
-X( 4) = ( -1.61045535321522E-01, -1.73300327231501E-01)
-
-X( 5) = ( -1.72008675736359E-01,  3.76244278349931E-01)
-
-PATH NUMBER =      3605
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.38333636872238E-01,  3.88534632559035E-01)
-X( 2) = (  1.29105024258347E-01,  3.15968476807961E-01)
-X( 3) = (  9.80354979926240E-01,  2.08590633508631E-01)
-X( 4) = ( -2.48924078872497E-01, -1.80790945755541E-01)
-
-X( 5) = ( -9.56400326616846E-02,  4.01383947303986E-01)
-
-PATH NUMBER =      3606
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.53902292685040E-01,  1.34797231163035E-01)
-X( 2) = (  1.07801816238204E-02, -7.07125718153147E-02)
-X( 3) = (  8.22660427105933E-01,  5.11154588985872E-01)
-X( 4) = ( -3.11428072052969E-01, -2.43016331403272E-01)
-
-X( 5) = ( -2.48133632876367E-02,  4.54327599128717E-01)
-
-PATH NUMBER =      3607
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.55938205849657E-01, -1.98141756181071E-01)
-X( 2) = (  1.68691880396353E-01, -4.42985183136178E-01)
-X( 3) = (  5.07375029489284E-01,  6.41567921099357E-01)
-X( 4) = ( -3.19311201799288E-01, -3.30860534671991E-01)
-
-X( 5) = (  3.55679112091820E-02,  5.57771779177535E-01)
-
-PATH NUMBER =      3608
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.43488749969709E-01, -4.54496477090297E-01)
-X( 2) = (  5.28951481727234E-01, -6.26658864968379E-01)
-X( 3) = (  1.82024328628009E-01,  5.38808782370445E-01)
-X( 4) = ( -2.68884864091923E-01, -4.03220276572692E-01)
-
-X( 5) = (  1.71832352955648E-02,  7.55979476160453E-01)
-
-PATH NUMBER =      3609
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.59613865641229E-02, -5.14315708585848E-01)
-X( 2) = (  9.22989514314260E-01, -5.35790660277037E-01)
-X( 3) = ( -1.15646667463160E-03,  2.50959315851012E-01)
-X( 4) = ( -1.83744102770469E-01, -4.26237629681085E-01)
-
-X( 5) = ( -2.88116160795450E-01,  8.85785686903395E-01)
-
-PATH NUMBER =      3610
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.53080273721426E-01, -6.22153885280287E-01)
-X( 2) = (  1.04728203480081E+00, -1.51894449004892E-01)
-X( 3) = ( -1.13779771567855E-01,  8.70503817471338E-02)
-X( 4) = (  1.91301691809975E-01, -2.03021397996791E-01)
-
-X( 5) = ( -2.73538496206943E-01,  1.26667211378413E+00)
-
-PATH NUMBER =      3611
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.68865246468912E-01, -3.09989899013457E-01)
-X( 2) = (  1.02621830860868E+00,  2.51936358621006E-01)
-X( 3) = (  1.37887603473029E-01, -1.43332020973347E-01)
-X( 4) = (  2.28753897653586E-01, -1.23171037572049E-01)
-
-X( 5) = ( -3.74850936835189E-01,  7.59658000919048E-01)
-
-PATH NUMBER =      3612
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.56906538876128E-01,  3.56673387809341E-03)
-X( 2) = (  7.50505118656177E-01,  5.47749202552940E-01)
-X( 3) = (  4.78762951595977E-01, -1.58046509931154E-01)
-X( 4) = (  2.06117129512603E-01, -3.79282988159255E-02)
-
-X( 5) = ( -2.24548759837994E-01,  5.67889623567172E-01)
-
-PATH NUMBER =      3613
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.30409125491826E-01,  1.71799380070604E-01)
-X( 2) = (  3.49151730732872E-01,  5.97129965521602E-01)
-X( 3) = (  7.49346909006756E-01,  4.97919877903995E-02)
-X( 4) = (  1.33983382779848E-01,  1.28207934400752E-02)
-
-X( 5) = ( -9.46012131027352E-02,  5.00333265717640E-01)
-
-PATH NUMBER =      3614
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.58643554119259E-01,  1.15990114713000E-01)
-X( 2) = (  9.95585559412507E-03,  3.76972839727906E-01)
-X( 3) = (  8.23030234827147E-01,  3.82933529239791E-01)
-X( 4) = (  4.61048392288729E-02,  5.33017491603494E-03)
-
-X( 5) = (  1.79513445084500E-02,  4.78060499219071E-01)
-
-PATH NUMBER =      3615
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.74212209932061E-01, -1.37747286682999E-01)
-X( 2) = ( -1.08368987040402E-01, -9.70820889537020E-03)
-X( 3) = (  6.65335682006840E-01,  6.85497484717032E-01)
-X( 4) = ( -1.63991539515992E-02, -5.68952107316959E-02)
-
-X( 5) = (  1.30750759491531E-01,  4.83933025047787E-01)
-
-PATH NUMBER =      3616
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.76248123096678E-01, -4.70686274027106E-01)
-X( 2) = (  4.95427117321311E-02, -3.81980820216233E-01)
-X( 3) = (  3.50050284390191E-01,  8.15910816830517E-01)
-X( 4) = ( -2.42822836979185E-02, -1.44739414000415E-01)
-
-X( 5) = (  2.62773164700378E-01,  5.28617425682945E-01)
-
-PATH NUMBER =      3617
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.63798667216730E-01, -7.27040994936332E-01)
-X( 2) = (  4.09802313063012E-01, -5.65654502048435E-01)
-X( 3) = (  2.46995835289159E-02,  7.13151678101606E-01)
-X( 4) = (  2.61440540094462E-02, -2.17099155901116E-01)
-
-X( 5) = (  4.29940929312272E-01,  6.75746575340316E-01)
-
-PATH NUMBER =      3618
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.36271303811144E-01, -7.86860226431883E-01)
-X( 2) = (  8.03840345650038E-01, -4.74786297357093E-01)
-X( 3) = ( -1.58481211773724E-01,  4.25302211582172E-01)
-X( 4) = (  1.11284815330901E-01, -2.40116509009509E-01)
-
-X( 5) = (  4.66267001301789E-01,  1.13839005514265E+00)
-
-PATH NUMBER =      3619
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.36105769321665E-01, -9.08268822807581E-01)
-X( 2) = (  9.16795627621575E-01, -1.81750005105868E-01)
-X( 3) = ( -3.46362971528987E-01,  1.19478391372471E-01)
-X( 4) = (  2.97670604812271E-01,  1.29196585295532E-01)
-
-X( 5) = (  3.62334917963191E+00,  3.20582711767887E+00)
-
-PATH NUMBER =      3620
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.51890742069150E-01, -5.96104836540752E-01)
-X( 2) = (  8.95731901429441E-01,  2.22080802520029E-01)
-X( 3) = ( -9.46955964881029E-02, -1.10904011348010E-01)
-X( 4) = (  3.35122810655882E-01,  2.09046945720274E-01)
-
-X( 5) = ( -8.64967102128188E-01,  1.86489356209701E+00)
-
-PATH NUMBER =      3621
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.39932034476367E-01, -2.82548203649201E-01)
-X( 2) = (  6.20018711476942E-01,  5.17893646451963E-01)
-X( 3) = (  2.46179751634845E-01, -1.25618500305817E-01)
-X( 4) = (  3.12486042514899E-01,  2.94289684476397E-01)
-
-X( 5) = ( -3.15759427998005E-01,  1.00518765146205E+00)
-
-PATH NUMBER =      3622
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.73836298915874E-02, -1.14315557456690E-01)
-X( 2) = (  2.18665323553637E-01,  5.67274409420626E-01)
-X( 3) = (  5.16763709045625E-01,  8.22199974157363E-02)
-X( 4) = (  2.40352295782144E-01,  3.45038776732398E-01)
-
-X( 5) = ( -2.73486910792129E-02,  7.61006699624686E-01)
-
-PATH NUMBER =      3623
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.75618058519021E-01, -1.70124822814294E-01)
-X( 2) = ( -1.20530551585109E-01,  3.47117283626929E-01)
-X( 3) = (  5.90447034866016E-01,  4.15361538865128E-01)
-X( 4) = (  1.52473752231169E-01,  3.37548158208357E-01)
-
-X( 5) = (  1.70579475519663E-01,  6.33653019365350E-01)
-
-PATH NUMBER =      3624
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.91186714331823E-01, -4.23862224210294E-01)
-X( 2) = ( -2.38855394219636E-01, -3.95637649963469E-02)
-X( 3) = (  4.32752482045708E-01,  7.17925494342369E-01)
-X( 4) = (  8.99697590506968E-02,  2.75322772560627E-01)
-
-X( 5) = (  3.47088694073112E-01,  5.41947393433519E-01)
-
-PATH NUMBER =      3625
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.93222627496440E-01, -7.56801211554400E-01)
-X( 2) = ( -8.09436954471032E-02, -4.11836376317210E-01)
-X( 3) = (  1.17467084429059E-01,  8.48338826455853E-01)
-X( 4) = (  8.20866293043777E-02,  1.87478569291908E-01)
-
-X( 5) = (  5.47406768115524E-01,  4.59469252468031E-01)
-
-PATH NUMBER =      3626
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.80773171616492E-01, -1.01315593246363E+00)
-X( 2) = (  2.79315905883777E-01, -5.95510058149411E-01)
-X( 3) = ( -2.07883616432215E-01,  7.45579687726943E-01)
-X( 4) = (  1.32512967011742E-01,  1.15118827391206E-01)
-
-X( 5) = (  8.47156234504521E-01,  3.73948305304667E-01)
-
-PATH NUMBER =      3627
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.32458082109058E-02, -1.07297516395918E+00)
-X( 2) = (  6.73353938470803E-01, -5.04641853458070E-01)
-X( 3) = ( -3.91064411734856E-01,  4.57730221207509E-01)
-X( 4) = (  2.17653728333197E-01,  9.21014742828134E-02)
-
-X( 5) = (  1.52698820568286E+00,  3.29189364864067E-01)
-
-PATH NUMBER =      3628
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.83618125652209E-01, -1.07407782093378E+00)
-X( 2) = (  8.36028022041372E-01, -2.88495733720573E-01)
-X( 3) = ( -5.45376362216004E-01, -5.18191120889370E-03)
-X( 4) = (  1.65608316162932E-01,  4.52062944634511E-01)
-
-X( 5) = (  4.66748634742143E-03, -1.85134411785255E+00)
-
-PATH NUMBER =      3629
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.99403098399694E-01, -7.61913834666952E-01)
-X( 2) = (  8.14964295849237E-01,  1.15335073905324E-01)
-X( 3) = ( -2.93708987175120E-01, -2.35564313929374E-01)
-X( 4) = (  2.03060522006542E-01,  5.31913305059252E-01)
-
-X( 5) = ( -1.94777561891865E+00, -1.28259764886143E+00)
-
-PATH NUMBER =      3630
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.87444390806911E-01, -4.48357201775401E-01)
-X( 2) = (  5.39251105896738E-01,  4.11147917837259E-01)
-X( 3) = (  4.71663609478279E-02, -2.50278802887181E-01)
-X( 4) = (  1.80423753865560E-01,  6.17156043815376E-01)
-
-X( 5) = ( -1.79535524581177E+00,  9.36363314169863E-01)
-
-PATH NUMBER =      3631
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.00128726438957E-01, -2.80124555582891E-01)
-X( 2) = (  1.37897717973434E-01,  4.60528680805921E-01)
-X( 3) = (  3.17750318358607E-01, -4.24403051656279E-02)
-X( 4) = (  1.08290007132804E-01,  6.67905136071377E-01)
-
-X( 5) = ( -4.52041472486430E-01,  1.43144874968919E+00)
-
-PATH NUMBER =      3632
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.28105702188476E-01, -3.35933820940494E-01)
-X( 2) = ( -2.01298157165313E-01,  2.40371555012224E-01)
-X( 3) = (  3.91433644178998E-01,  2.90701236283763E-01)
-X( 4) = (  2.04114635818291E-02,  6.60414517547336E-01)
-
-X( 5) = (  3.51737304172604E-01,  1.15135413985672E+00)
-
-PATH NUMBER =      3633
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.43674358001278E-01, -5.89671222336494E-01)
-X( 2) = ( -3.19622999799840E-01, -1.46309493611052E-01)
-X( 3) = (  2.33739091358691E-01,  5.93265191761004E-01)
-X( 4) = ( -4.20925295986431E-02,  5.98189131899605E-01)
-
-X( 5) = (  7.89332444118657E-01,  7.27995370406214E-01)
-
-PATH NUMBER =      3634
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.45710271165895E-01, -9.22610209680600E-01)
-X( 2) = ( -1.61711301027307E-01, -5.18582104931915E-01)
-X( 3) = ( -8.15463062579578E-02,  7.23678523874489E-01)
-X( 4) = ( -4.99756593449623E-02,  5.10344928630886E-01)
-
-X( 5) = (  1.02861115055242E+00,  2.49182403552675E-01)
-
-PATH NUMBER =      3635
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.33260815285947E-01, -1.17896493058983E+00)
-X( 2) = (  1.98548300303574E-01, -7.02255786764116E-01)
-X( 3) = ( -4.06897007119233E-01,  6.20919385145578E-01)
-X( 4) = (  4.50678362402426E-04,  4.37985186730185E-01)
-
-X( 5) = (  1.10607509721237E+00, -3.19469829062942E-01)
-
-PATH NUMBER =      3636
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.94266548119639E-01, -1.23878416208538E+00)
-X( 2) = (  5.92586332890600E-01, -6.11387582072774E-01)
-X( 3) = ( -5.90077802421874E-01,  3.33069918626145E-01)
-X( 4) = (  8.55914396838572E-02,  4.14967833621792E-01)
-
-X( 5) = (  9.13469117413148E-01, -1.04853544366464E+00)
-
-PATH NUMBER =      3637
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.79803560392567E-01, -1.04199700667389E+00)
-X( 2) = (  8.42771278343125E-01, -4.22184122083559E-01)
-X( 3) = ( -6.17699366338984E-01, -2.28600584974199E-01)
-X( 4) = ( -1.43091761570167E-01,  6.14504922225548E-01)
-
-X( 5) = ( -4.49746713174678E-01, -7.83161982597337E-01)
-
-PATH NUMBER =      3638
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.95588533140053E-01, -7.29833020407059E-01)
-X( 2) = (  8.21707552150991E-01, -1.83533144576613E-02)
-X( 3) = ( -3.66031991298100E-01, -4.58982987694680E-01)
-X( 4) = ( -1.05639555726557E-01,  6.94355282650289E-01)
-
-X( 5) = ( -7.22978873011062E-01, -5.20573362194007E-01)
-
-PATH NUMBER =      3639
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.83629825547270E-01, -4.16276387515508E-01)
-X( 2) = (  5.45994362198492E-01,  2.77459529474273E-01)
-X( 3) = ( -2.51566431751521E-02, -4.73697476652487E-01)
-X( 4) = ( -1.28276323867539E-01,  7.79598021406413E-01)
-
-X( 5) = ( -9.72993149762218E-01, -1.88269393185304E-01)
-
-PATH NUMBER =      3640
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.96314161179316E-01, -2.48043741322997E-01)
-X( 2) = (  1.44640974275187E-01,  3.26840292442935E-01)
-X( 3) = (  2.45427314235627E-01, -2.65858978930934E-01)
-X( 4) = ( -2.00410070600294E-01,  8.30347113662414E-01)
-
-X( 5) = ( -1.22722724635536E+00,  3.50511962342818E-01)
-
-PATH NUMBER =      3641
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.68079732551882E-01, -3.03853006680601E-01)
-X( 2) = ( -1.94554900863560E-01,  1.06683166649239E-01)
-X( 3) = (  3.19110640056019E-01,  6.72825625184577E-02)
-X( 4) = ( -2.88288614151270E-01,  8.22856495138373E-01)
-
-X( 5) = ( -1.31237068003750E+00,  1.58425351177690E+00)
-
-PATH NUMBER =      3642
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.74889232609203E-02, -5.57590408076600E-01)
-X( 2) = ( -3.12879743498086E-01, -2.79997881974037E-01)
-X( 3) = (  1.61416087235711E-01,  3.69846517995698E-01)
-X( 4) = ( -3.50792607331742E-01,  7.60631109490642E-01)
-
-X( 5) = (  2.12491670689980E+00,  3.40700961295670E+00)
-
-PATH NUMBER =      3643
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.95248364255370E-02, -8.90529395420707E-01)
-X( 2) = ( -1.54968044725553E-01, -6.52270493294900E-01)
-X( 3) = ( -1.53869310380938E-01,  5.00259850109183E-01)
-X( 4) = ( -3.58675737078061E-01,  6.72786906221923E-01)
-
-X( 5) = (  2.11709527954856E+00, -1.14457360957541E+00)
-
-PATH NUMBER =      3644
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.62924619454411E-01, -1.14688411632993E+00)
-X( 2) = (  2.05291556605327E-01, -8.35944175127101E-01)
-X( 3) = ( -4.79220011242213E-01,  3.97500711380272E-01)
-X( 4) = ( -3.08249399370696E-01,  6.00427164321222E-01)
-
-X( 5) = (  5.45510996025560E-01, -1.28020148398454E+00)
-
-PATH NUMBER =      3645
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.90451982859997E-01, -1.20670334782548E+00)
-X( 2) = (  5.99329589192353E-01, -7.45075970435760E-01)
-X( 3) = ( -6.62400806544854E-01,  1.09651244860839E-01)
-X( 4) = ( -2.23108638049241E-01,  5.77409811212829E-01)
-
-X( 5) = ( -8.62536909706765E-02, -1.03200439091548E+00)
-
-PATH NUMBER =      3646
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.16832290595060E+00, -5.76850621738299E-01)
-X( 2) = (  8.89154190482538E-01, -1.64836563614019E-01)
-X( 3) = ( -5.28418002742216E-01, -3.61936671473160E-01)
-X( 4) = ( -5.68959057634995E-01,  2.77812321568582E-01)
-
-X( 5) = ( -8.15000782521800E-01, -1.31961493766265E-01)
-
-PATH NUMBER =      3647
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.28410787869809E+00, -2.64686635471470E-01)
-X( 2) = (  8.68090464290403E-01,  2.38994244011878E-01)
-X( 3) = ( -2.76750627701332E-01, -5.92319074193640E-01)
-X( 4) = ( -5.31506851791385E-01,  3.57662681993323E-01)
-
-X( 5) = ( -6.39789850798554E-01,  4.55553058898470E-02)
-
-PATH NUMBER =      3648
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17214917110531E+00,  4.88699974200809E-02)
-X( 2) = (  5.92377274337904E-01,  5.34807087943812E-01)
-X( 3) = (  6.41247204216163E-02, -6.07033563151447E-01)
-X( 4) = ( -5.54143619932367E-01,  4.42905420749447E-01)
-
-X( 5) = ( -5.44344646459506E-01,  1.91424748000132E-01)
-
-PATH NUMBER =      3649
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.84833506737353E-01,  2.17102643612591E-01)
-X( 2) = (  1.91023886414600E-01,  5.84187850912474E-01)
-X( 3) = (  3.34708677832396E-01, -3.99195065429894E-01)
-X( 4) = ( -6.26277366665123E-01,  4.93654513005448E-01)
-
-X( 5) = ( -4.79087144672233E-01,  3.36548443351289E-01)
-
-PATH NUMBER =      3650
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.56599078109919E-01,  1.61293378254988E-01)
-X( 2) = ( -1.48171988724147E-01,  3.64030725118778E-01)
-X( 3) = (  4.08392003652787E-01, -6.60535239805020E-02)
-X( 4) = ( -7.14155910216098E-01,  4.86163894481407E-01)
-
-X( 5) = ( -4.31331436481231E-01,  5.15685022955838E-01)
-
-PATH NUMBER =      3651
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.41030422297117E-01, -9.24440231410116E-02)
-X( 2) = ( -2.66496831358674E-01, -2.26503235044984E-02)
-X( 3) = (  2.50697450832479E-01,  2.36510431496739E-01)
-X( 4) = ( -7.76659903396570E-01,  4.23938508833676E-01)
-
-X( 5) = ( -4.20393454696309E-01,  8.02283048596055E-01)
-
-PATH NUMBER =      3652
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.38994509132500E-01, -4.25383010485118E-01)
-X( 2) = ( -1.08585132586141E-01, -3.94922934825361E-01)
-X( 3) = ( -6.45879467841695E-02,  3.66923763610224E-01)
-X( 4) = ( -7.84543033142889E-01,  3.36094305564957E-01)
-
-X( 5) = ( -6.94265410320134E-01,  1.41737447001170E+00)
-
-PATH NUMBER =      3653
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.51443965012448E-01, -6.81737731394344E-01)
-X( 2) = (  2.51674468744741E-01, -5.78596616657562E-01)
-X( 3) = ( -3.89938647645445E-01,  2.64164624881313E-01)
-X( 4) = ( -7.34116695435524E-01,  2.63734563664256E-01)
-
-X( 5) = ( -2.54295519664746E+00,  7.40212460059456E-01)
-
-PATH NUMBER =      3654
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.78971328418034E-01, -7.41556962889896E-01)
-X( 2) = (  6.45712501331767E-01, -4.87728411966221E-01)
-X( 3) = ( -5.73119442948086E-01, -2.36848416381210E-02)
-X( 4) = ( -6.48975934114070E-01,  2.40717210555863E-01)
-
-X( 5) = ( -1.28621480245446E+00, -3.47267191595889E-01)
-
-PATH NUMBER =      3655
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18816153233867E+00, -2.79594134342401E-01)
-X( 2) = (  1.02198250599845E+00, -1.81410497541965E-01)
-X( 3) = ( -3.20952318519790E-01, -4.71957172210712E-01)
-X( 4) = ( -7.82538382525276E-01,  2.00984504685011E-03)
-
-X( 5) = ( -5.71236020032971E-01,  9.30710192705280E-02)
-
-PATH NUMBER =      3656
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.30394650508615E+00,  3.25698519244281E-02)
-X( 2) = (  1.00091877980632E+00,  2.22420310083933E-01)
-X( 3) = ( -6.92849434789068E-02, -7.02339574931192E-01)
-X( 4) = ( -7.45086176681666E-01,  8.18602054715920E-02)
-
-X( 5) = ( -4.48642566524991E-01,  1.26494805835041E-01)
-
-PATH NUMBER =      3657
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19198779749337E+00,  3.46126484815979E-01)
-X( 2) = (  7.25205589853820E-01,  5.18233154015866E-01)
-X( 3) = (  2.71590404644042E-01, -7.17054063888999E-01)
-X( 4) = ( -7.67722944822648E-01,  1.67102944227716E-01)
-
-X( 5) = ( -3.76632854443786E-01,  1.83765242310847E-01)
-
-PATH NUMBER =      3658
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.04672133125416E-01,  5.14359131008490E-01)
-X( 2) = (  3.23852201930516E-01,  5.67613916984528E-01)
-X( 3) = (  5.42174362054821E-01, -5.09215566167446E-01)
-X( 4) = ( -8.39856691555403E-01,  2.17852036483716E-01)
-
-X( 5) = ( -3.31723183467985E-01,  2.52752388485907E-01)
-
-PATH NUMBER =      3659
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.76437704497982E-01,  4.58549865650886E-01)
-X( 2) = ( -1.53436732082313E-02,  3.47456791190832E-01)
-X( 3) = (  6.15857687875213E-01, -1.76074024718054E-01)
-X( 4) = ( -9.27735235106379E-01,  2.10361417959676E-01)
-
-X( 5) = ( -3.08658391417663E-01,  3.39945790840451E-01)
-
-PATH NUMBER =      3660
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.60869048685180E-01,  2.04812464254887E-01)
-X( 2) = ( -1.33668515842758E-01, -3.92242574324441E-02)
-X( 3) = (  4.58163135054905E-01,  1.26489930759187E-01)
-X( 4) = ( -9.90239228286851E-01,  1.48136032311945E-01)
-
-X( 5) = ( -3.24955015565230E-01,  4.60794106433427E-01)
-
-PATH NUMBER =      3661
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.58833135520563E-01, -1.28126523089220E-01)
-X( 2) = (  2.42431829297750E-02, -4.11496868753307E-01)
-X( 3) = (  1.42877737438256E-01,  2.56903262872672E-01)
-X( 4) = ( -9.98122358033170E-01,  6.02918290432259E-02)
-
-X( 5) = ( -4.62644666694420E-01,  6.10559732615234E-01)
-
-PATH NUMBER =      3662
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71282591400511E-01, -3.84481243998446E-01)
-X( 2) = (  3.84502784260656E-01, -5.95170550585508E-01)
-X( 3) = ( -1.82472963423020E-01,  1.54144124143760E-01)
-X( 4) = ( -9.47696020325805E-01, -1.20679128574754E-02)
-
-X( 5) = ( -7.97532689029518E-01,  5.27572951700996E-01)
-
-PATH NUMBER =      3663
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.98809954806097E-01, -4.44300475493997E-01)
-X( 2) = (  7.78540816847682E-01, -5.04302345894167E-01)
-X( 3) = ( -3.65653758725660E-01, -1.33705342375673E-01)
-X( 4) = ( -8.62555259004351E-01, -3.50852659658682E-02)
-
-X( 5) = ( -7.71636890445025E-01,  1.72410293709169E-01)
-
-PATH NUMBER =      3664
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01228601484533E+00, -3.91304307562593E-02)
-X( 2) = (  1.13438841836092E+00, -1.08726472098924E-01)
-X( 3) = ( -9.13045692977178E-02, -4.22881394176566E-01)
-X( 4) = ( -7.68867222893547E-01, -3.46553253215762E-01)
-
-X( 5) = ( -4.32172049786646E-01,  2.33019894695400E-01)
-
-PATH NUMBER =      3665
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12807098759282E+00,  2.73033555510570E-01)
-X( 2) = (  1.11332469216879E+00,  2.95104335526973E-01)
-X( 3) = (  1.60362805743166E-01, -6.53263796897046E-01)
-X( 4) = ( -7.31415017049937E-01, -2.66702892791021E-01)
-
-X( 5) = ( -3.44505173212964E-01,  2.03438955446192E-01)
-
-PATH NUMBER =      3666
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01611228000003E+00,  5.86590188402121E-01)
-X( 2) = (  8.37611502216288E-01,  5.90917179458907E-01)
-X( 3) = (  5.01238153866114E-01, -6.67978285854853E-01)
-X( 4) = ( -7.54051785190919E-01, -1.81460154034897E-01)
-
-X( 5) = ( -2.79263615685902E-01,  2.17099174307913E-01)
-
-PATH NUMBER =      3667
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.28796615632079E-01,  7.54822834594631E-01)
-X( 2) = (  4.36258114292984E-01,  6.40297942427569E-01)
-X( 3) = (  7.71822111276894E-01, -4.60139788133300E-01)
-X( 4) = ( -8.26185531923675E-01, -1.30711061778897E-01)
-
-X( 5) = ( -2.32836453829766E-01,  2.50031310956238E-01)
-
-PATH NUMBER =      3668
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.00562187004646E-01,  6.99013569237028E-01)
-X( 2) = (  9.70622391542368E-02,  4.20140816633873E-01)
-X( 3) = (  8.45505437097285E-01, -1.26998246683909E-01)
-X( 4) = ( -9.14064075474650E-01, -1.38201680302937E-01)
-
-X( 5) = ( -2.01424362483705E-01,  2.98769086536964E-01)
-
-PATH NUMBER =      3669
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.84993531191843E-01,  4.45276167841028E-01)
-X( 2) = ( -2.12626034802899E-02,  3.34597680105967E-02)
-X( 3) = (  6.87810884276977E-01,  1.75565708793332E-01)
-X( 4) = ( -9.76568068655122E-01, -2.00427065950668E-01)
-
-X( 5) = ( -1.91208330601154E-01,  3.68478457423863E-01)
-
-PATH NUMBER =      3670
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.82957618027226E-01,  1.12337180496921E-01)
-X( 2) = (  1.36649095292243E-01, -3.38812843310266E-01)
-X( 3) = (  3.72525486660328E-01,  3.05979040906817E-01)
-X( 4) = ( -9.84451198401441E-01, -2.88271269219387E-01)
-
-X( 5) = ( -2.33098163147047E-01,  4.60243791596771E-01)
-
-PATH NUMBER =      3671
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.95407073907174E-01, -1.44017540412305E-01)
-X( 2) = (  4.96908696623124E-01, -5.22486525142467E-01)
-X( 3) = (  4.71747857990530E-02,  2.03219902177906E-01)
-X( 4) = ( -9.34024860694076E-01, -3.60631011120088E-01)
-
-X( 5) = ( -3.80357768975142E-01,  5.01697486947937E-01)
-
-PATH NUMBER =      3672
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.22934437312761E-01, -2.03836771907856E-01)
-X( 2) = (  8.90946729210151E-01, -4.31618320451126E-01)
-X( 3) = ( -1.36006009503588E-01, -8.46295643415277E-02)
-X( 4) = ( -8.48884099372621E-01, -3.83648364228481E-01)
-
-X( 5) = ( -4.93677144910840E-01,  3.60268660102893E-01)
-
-PATH NUMBER =      3673
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.22990462744377E-01,  3.20248496557886E-02)
-X( 2) = (  1.17377595192298E+00,  1.92058494173414E-02)
-X( 3) = (  5.30705108125563E-02, -2.37672439329418E-01)
-X( 4) = ( -5.34342466269510E-01, -6.04780425694849E-01)
-
-X( 5) = ( -3.21195710835547E-01,  3.51447735114556E-01)
-
-PATH NUMBER =      3674
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.38775435491863E-01,  3.44188835922618E-01)
-X( 2) = (  1.15271222573085E+00,  4.23036657043239E-01)
-X( 3) = (  3.04737885853440E-01, -4.68054842049899E-01)
-X( 4) = ( -4.96890260425900E-01, -5.24930065270108E-01)
-
-X( 5) = ( -2.69331421133370E-01,  2.81202575139548E-01)
-
-PATH NUMBER =      3675
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.26816727899079E-01,  6.57745468814168E-01)
-X( 2) = (  8.76999035778348E-01,  7.18849500975173E-01)
-X( 3) = (  6.45613233976388E-01, -4.82769331007705E-01)
-X( 4) = ( -5.19527028566882E-01, -4.39687326513984E-01)
-
-X( 5) = ( -2.10384774296805E-01,  2.62831952630476E-01)
-
-PATH NUMBER =      3676
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.39501063531125E-01,  8.25978115006679E-01)
-X( 2) = (  4.75645647855044E-01,  7.68230263943835E-01)
-X( 3) = (  9.16197191387168E-01, -2.74930833286152E-01)
-X( 4) = ( -5.91660775299637E-01, -3.88938234257983E-01)
-
-X( 5) = ( -1.61073055525731E-01,  2.71201456615109E-01)
-
-PATH NUMBER =      3677
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11266634903692E-01,  7.70168849649076E-01)
-X( 2) = (  1.36449772716296E-01,  5.48073138150139E-01)
-X( 3) = (  9.89880517207559E-01,  5.82107081632389E-02)
-X( 4) = ( -6.79539318850612E-01, -3.96428852782024E-01)
-
-X( 5) = ( -1.21135353443179E-01,  2.97264411848230E-01)
-
-PATH NUMBER =      3678
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.04302020909111E-01,  5.16431448253076E-01)
-X( 2) = (  1.81249300817702E-02,  1.61392089526862E-01)
-X( 3) = (  8.32185964387251E-01,  3.60774663640480E-01)
-X( 4) = ( -7.42043312031085E-01, -4.58654238429755E-01)
-
-X( 5) = ( -9.23251108915774E-02,  3.42499952294126E-01)
-
-PATH NUMBER =      3679
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.06337934073727E-01,  1.83492460908969E-01)
-X( 2) = (  1.76036628854303E-01, -2.10880521794001E-01)
-X( 3) = (  5.16900566770602E-01,  4.91187995753965E-01)
-X( 4) = ( -7.49926441777404E-01, -5.46498441698474E-01)
-
-X( 5) = ( -8.92878610731341E-02,  4.13037039637837E-01)
-
-PATH NUMBER =      3680
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06111521806221E-01, -7.28622600002567E-02)
-X( 2) = (  5.36296230185184E-01, -3.94554203626202E-01)
-X( 3) = (  1.91549865909327E-01,  3.88428857025054E-01)
-X( 4) = ( -6.99500104070039E-01, -6.18858183599175E-01)
-
-X( 5) = ( -1.55207325701610E-01,  4.91688325417766E-01)
-
-PATH NUMBER =      3681
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.33638885211807E-01, -1.32681491495808E-01)
-X( 2) = (  9.30334262772210E-01, -3.03685998934860E-01)
-X( 3) = (  8.36907060668647E-03,  1.00579390505620E-01)
-X( 4) = ( -6.14359342748584E-01, -6.41875536707568E-01)
-
-X( 5) = ( -2.87331445394849E-01,  4.70309003298113E-01)
-
-PATH NUMBER =      3682
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.55639480025769E-01, -9.94226396139097E-02)
-X( 2) = (  1.12171524198727E+00,  1.42525511959992E-01)
-X( 3) = (  4.46182172771483E-02, -2.99163601050169E-03)
-X( 4) = ( -1.88700852729889E-01, -6.51844308512097E-01)
-
-X( 5) = ( -2.06412894084130E-01,  4.80847083434726E-01)
-
-PATH NUMBER =      3683
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71424452773254E-01,  2.12741346652919E-01)
-X( 2) = (  1.10065151579514E+00,  5.46356319585889E-01)
-X( 3) = (  2.96285592318032E-01, -2.33374038730982E-01)
-X( 4) = ( -1.51248646886279E-01, -5.71993948087355E-01)
-
-X( 5) = ( -2.02985237196748E-01,  3.75663595444257E-01)
-
-PATH NUMBER =      3684
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.59465745180471E-01,  5.26297979544470E-01)
-X( 2) = (  8.24938325842636E-01,  8.42169163517823E-01)
-X( 3) = (  6.37160940440981E-01, -2.48088527688789E-01)
-X( 4) = ( -1.73885415027261E-01, -4.86751209331232E-01)
-
-X( 5) = ( -1.53017203953918E-01,  3.23790956215294E-01)
-
-PATH NUMBER =      3685
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.72150080812517E-01,  6.94530625736981E-01)
-X( 2) = (  4.23584937919331E-01,  8.91549926486485E-01)
-X( 3) = (  9.07744897851760E-01, -4.02500299672355E-02)
-X( 4) = ( -2.46019161760016E-01, -4.36002117075231E-01)
-
-X( 5) = ( -1.00535989207491E-01,  3.08347860037326E-01)
-
-PATH NUMBER =      3686
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.56084347814916E-01,  6.38721360379378E-01)
-X( 2) = (  8.43890627805846E-02,  6.71392800692789E-01)
-X( 3) = (  9.81428223672151E-01,  2.92891511482156E-01)
-X( 4) = ( -3.33897705310991E-01, -4.43492735599271E-01)
-
-X( 5) = ( -5.22183104798523E-02,  3.14901149723449E-01)
-
-PATH NUMBER =      3687
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.71653003627719E-01,  3.84983958983378E-01)
-X( 2) = ( -3.39357798539417E-02,  2.84711752069513E-01)
-X( 3) = (  8.23733670851844E-01,  5.95455466959397E-01)
-X( 4) = ( -3.96401698491463E-01, -5.05718121247002E-01)
-
-X( 5) = ( -8.23383915831535E-03,  3.41378925048841E-01)
-
-PATH NUMBER =      3688
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.73688916792336E-01,  5.20449716392713E-02)
-X( 2) = (  1.23975918918591E-01, -8.75608592513504E-02)
-X( 3) = (  5.08448273235195E-01,  7.25868799072882E-01)
-X( 4) = ( -4.04284828237783E-01, -5.93562324515721E-01)
-
-X( 5) = (  2.56040636524722E-02,  3.95376656313449E-01)
-
-PATH NUMBER =      3689
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.61239460912387E-01, -2.04309749269955E-01)
-X( 2) = (  4.84235520249472E-01, -2.71234541083552E-01)
-X( 3) = (  1.83097572373919E-01,  6.23109660343971E-01)
-X( 4) = ( -3.53858490530418E-01, -6.65922066416423E-01)
-
-X( 5) = (  1.87452040761180E-02,  4.85850188322398E-01)
-
-PATH NUMBER =      3690
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.66287902493199E-01, -2.64128980765506E-01)
-X( 2) = (  8.78273552836498E-01, -1.80366336392210E-01)
-X( 3) = ( -8.32229287213367E-05,  3.35260193824537E-01)
-X( 4) = ( -2.68717729208963E-01, -6.88939419524815E-01)
-
-X( 5) = ( -8.96011517173217E-02,  5.55673196766746E-01)
-
-PATH NUMBER =      3691
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.35329562778748E-01, -3.71967157459945E-01)
-X( 2) = (  1.00256607332305E+00,  2.03529874879936E-01)
-X( 3) = ( -1.12706527821945E-01,  1.71351259720659E-01)
-X( 4) = (  1.06328065371481E-01, -4.65723187840521E-01)
-
-X( 5) = ( -5.10727056120961E-02,  6.68421606236149E-01)
-
-PATH NUMBER =      3692
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.51114535526233E-01, -5.98031711931154E-02)
-X( 2) = (  9.81502347130914E-01,  6.07360682505834E-01)
-X( 3) = (  1.38960847218939E-01, -5.90311429998218E-02)
-X( 4) = (  1.43780271215091E-01, -3.85872827415779E-01)
-
-X( 5) = ( -1.37775918953544E-01,  5.21746163262029E-01)
-
-PATH NUMBER =      3693
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.39155827933449E-01,  2.53753461698435E-01)
-X( 2) = (  7.05789157178414E-01,  9.03173526437767E-01)
-X( 3) = (  4.79836195341888E-01, -7.37456319576284E-02)
-X( 4) = (  1.21143503074109E-01, -3.00630088659656E-01)
-
-X( 5) = ( -1.02486691377345E-01,  4.18163891278581E-01)
-
-PATH NUMBER =      3694
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.18401635654957E-02,  4.21986107890946E-01)
-X( 2) = (  3.04435769255110E-01,  9.52554289406430E-01)
-X( 3) = (  7.50420152752667E-01,  1.34092865763925E-01)
-X( 4) = (  4.90097563413536E-02, -2.49880996403655E-01)
-
-X( 5) = ( -4.38967210552854E-02,  3.70346301962977E-01)
-
-PATH NUMBER =      3695
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.76394265061938E-01,  3.66176842533342E-01)
-X( 2) = ( -3.47601058836374E-02,  7.32397163612733E-01)
-X( 3) = (  8.24103478573058E-01,  4.67234407213316E-01)
-X( 4) = ( -3.88687872096215E-02, -2.57371614927695E-01)
-
-X( 5) = (  1.60008124714936E-02,  3.53644158271451E-01)
-
-PATH NUMBER =      3696
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.91962920874740E-01,  1.12439441137343E-01)
-X( 2) = ( -1.53084948518164E-01,  3.45716114989457E-01)
-X( 3) = (  6.66408925752751E-01,  7.69798362690557E-01)
-X( 4) = ( -1.01372780390094E-01, -3.19597000575426E-01)
-
-X( 5) = (  7.70292357486430E-02,  3.59594467319342E-01)
-
-PATH NUMBER =      3697
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.93998834039357E-01, -2.20499546206764E-01)
-X( 2) = (  4.82675025436914E-03, -2.65564963314058E-02)
-X( 3) = (  3.51123528136102E-01,  9.00211694804042E-01)
-X( 4) = ( -1.09255910136413E-01, -4.07441203844145E-01)
-
-X( 5) = (  1.40737521344289E-01,  3.94202348505777E-01)
-
-PATH NUMBER =      3698
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.81549378159409E-01, -4.76854267115990E-01)
-X( 2) = (  3.65086351585250E-01, -2.10230178163607E-01)
-X( 3) = (  2.57728272748261E-02,  7.97452556075131E-01)
-X( 4) = ( -5.88295724290481E-02, -4.79800945744847E-01)
-
-X( 5) = (  1.93968988064275E-01,  4.81637652716177E-01)
-
-PATH NUMBER =      3699
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.59779852461771E-02, -5.36673498611541E-01)
-X( 2) = (  7.59124384172276E-01, -1.19361973472265E-01)
-X( 3) = ( -1.57407968027814E-01,  5.09603089555697E-01)
-X( 4) = (  2.63111888924065E-02, -5.02818298853239E-01)
-
-X( 5) = (  1.53113217876313E-01,  6.36417548243739E-01)
-
-PATH NUMBER =      3700
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.18355058378986E-01, -6.58082094987239E-01)
-X( 2) = (  8.72079666143813E-01,  1.73674318778959E-01)
-X( 3) = ( -3.45289727783077E-01,  2.03779269345995E-01)
-X( 4) = (  2.12696978373777E-01, -1.33505204548198E-01)
-
-X( 5) = (  2.55498763229999E-01,  1.08943849746344E+00)
-
-PATH NUMBER =      3701
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.34140031126471E-01, -3.45918108720410E-01)
-X( 2) = (  8.51015939951679E-01,  5.77505126404857E-01)
-X( 3) = ( -9.36223527421926E-02, -2.66031333744850E-02)
-X( 4) = (  2.50149184217387E-01, -5.36548441234565E-02)
-
-X( 5) = ( -1.10762574986733E-01,  8.36856726776893E-01)
-
-PATH NUMBER =      3702
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.22181323533688E-01, -3.23614758288590E-02)
-X( 2) = (  5.75302749999180E-01,  8.73317970336791E-01)
-X( 3) = (  2.47252995380756E-01, -4.13176223322917E-02)
-X( 4) = (  2.27512416076405E-01,  3.15878946326668E-02)
-
-X( 5) = ( -8.58312970650675E-02,  5.97967435843186E-01)
-
-PATH NUMBER =      3703
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.34865659165734E-01,  1.35871170363651E-01)
-X( 2) = (  1.73949362075875E-01,  9.22698733305453E-01)
-X( 3) = (  5.17836952791535E-01,  1.66520875389262E-01)
-X( 4) = (  1.55378669343650E-01,  8.23369868886674E-02)
-
-X( 5) = (  4.97147093441338E-04,  4.88892317862024E-01)
-
-PATH NUMBER =      3704
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.93368769461700E-01,  8.00619050060481E-02)
-X( 2) = ( -1.65246513062872E-01,  7.02541607511757E-01)
-X( 3) = (  5.91520278611927E-01,  4.99662416838653E-01)
-X( 4) = (  6.75001257926747E-02,  7.48463683646272E-02)
-
-X( 5) = (  8.80428853092417E-02,  4.35811304901267E-01)
-
-PATH NUMBER =      3705
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.08937425274502E-01, -1.73675496389952E-01)
-X( 2) = ( -2.83571355697398E-01,  3.15860558888480E-01)
-X( 3) = (  4.33825725791619E-01,  8.02226372315894E-01)
-X( 4) = (  4.99613261220284E-03,  1.26209827168964E-02)
-
-X( 5) = (  1.79054522490265E-01,  4.12001467258727E-01)
-
-PATH NUMBER =      3706
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.10973338439119E-01, -5.06614483734058E-01)
-X( 2) = ( -1.25659656924865E-01, -5.64120524323827E-02)
-X( 3) = (  1.18540328174970E-01,  9.32639704429379E-01)
-X( 4) = ( -2.88699713411634E-03, -7.52232205518223E-02)
-
-X( 5) = (  2.85807362152691E-01,  4.16264784122800E-01)
-
-PATH NUMBER =      3707
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.98523882559171E-01, -7.62969204643285E-01)
-X( 2) = (  2.34599944406016E-01, -2.40085734264584E-01)
-X( 3) = ( -2.06810372686306E-01,  8.29880565700468E-01)
-X( 4) = (  4.75393405732483E-02, -1.47582962452524E-01)
-
-X( 5) = (  4.24603225398410E-01,  4.78643389260456E-01)
-
-PATH NUMBER =      3708
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.29003480846416E-01, -8.22788436138836E-01)
-X( 2) = (  6.28637976993042E-01, -1.49217529573242E-01)
-X( 3) = ( -3.89991167988946E-01,  5.42031099181034E-01)
-X( 4) = (  1.32680101894703E-01, -1.70600315560916E-01)
-
-X( 5) = (  5.58303057377973E-01,  7.17886645527927E-01)
-
-PATH NUMBER =      3709
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.65867414709531E-01, -8.23891093113439E-01)
-X( 2) = (  7.91312060563610E-01,  6.69285901642548E-02)
-X( 3) = ( -5.44303118470094E-01,  7.91189667646310E-02)
-X( 4) = (  8.06346897244372E-02,  1.89361154790781E-01)
-
-X( 5) = (  1.27190278871127E+00,  4.84937620706814E+00)
-
-PATH NUMBER =      3710
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.81652387457016E-01, -5.11727106846610E-01)
-X( 2) = (  7.70248334371476E-01,  4.70759397790152E-01)
-X( 3) = ( -2.92635743429210E-01, -1.51263435955849E-01)
-X( 4) = (  1.18086895568048E-01,  2.69211515215522E-01)
-
-X( 5) = ( -9.01366336809508E-01,  1.45111616876737E+00)
-
-PATH NUMBER =      3711
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.69693679864232E-01, -1.98170473955059E-01)
-X( 2) = (  4.94535144418976E-01,  7.66572241722086E-01)
-X( 3) = (  4.82396046937384E-02, -1.65977924913656E-01)
-X( 4) = (  9.54501274270650E-02,  3.54454253971646E-01)
-
-X( 5) = ( -3.61375197188715E-01,  8.94009009408695E-01)
-
-PATH NUMBER =      3712
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.82378015496279E-01, -2.99378277625487E-02)
-X( 2) = (  9.31817564956717E-02,  8.15953004690748E-01)
-X( 3) = (  3.18823562104518E-01,  4.18605728078972E-02)
-X( 4) = (  2.33163806943100E-02,  4.05203346227647E-01)
-
-X( 5) = ( -7.98650316409703E-02,  7.21984729681581E-01)
-
-PATH NUMBER =      3713
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.41435868688452E-02, -8.57470931201521E-02)
-X( 2) = ( -2.46014118643075E-01,  5.95795878897052E-01)
-X( 3) = (  3.92506887924909E-01,  3.75002114257289E-01)
-X( 4) = ( -6.45621628566652E-02,  3.97712727703606E-01)
-
-X( 5) = (  1.20710821368001E-01,  6.31600569022452E-01)
-
-PATH NUMBER =      3714
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.61425068943957E-01, -3.39484494516152E-01)
-X( 2) = ( -3.64338961277602E-01,  2.09114830273776E-01)
-X( 3) = (  2.34812335104601E-01,  6.77566069734530E-01)
-X( 4) = ( -1.27066156037137E-01,  3.35487342055875E-01)
-
-X( 5) = (  3.05725867102210E-01,  5.68466845090620E-01)
-
-PATH NUMBER =      3715
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.63460982108574E-01, -6.72423481860258E-01)
-X( 2) = ( -2.06427262505069E-01, -1.63157781047087E-01)
-X( 3) = ( -8.04730625120475E-02,  8.07979401848014E-01)
-X( 4) = ( -1.34949285783456E-01,  2.47643138787156E-01)
-
-X( 5) = (  5.23222506421985E-01,  5.16736071301758E-01)
-
-PATH NUMBER =      3716
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.89884737713744E-02, -9.28778202769484E-01)
-X( 2) = (  1.53832338825812E-01, -3.46831462879289E-01)
-X( 3) = ( -4.05823763373323E-01,  7.05220263119103E-01)
-X( 4) = ( -8.45229480760918E-02,  1.75283396886455E-01)
-
-X( 5) = (  8.63778779326330E-01,  4.80953125991299E-01)
-
-PATH NUMBER =      3717
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.76515837176960E-01, -9.88597434265036E-01)
-X( 2) = (  5.47870371412838E-01, -2.55963258187947E-01)
-X( 3) = ( -5.89004558675964E-01,  4.17370796599669E-01)
-X( 4) = (  6.17813245362878E-04,  1.52266043778062E-01)
-
-X( 5) = (  1.69074454592310E+00,  6.18741839005615E-01)
-
-PATH NUMBER =      3718
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.62052849449889E-01, -7.91810278853545E-01)
-X( 2) = (  7.98055316865363E-01, -6.67597981987302E-02)
-X( 3) = ( -6.16626122593074E-01, -1.44299707000675E-01)
-X( 4) = ( -2.28065388008662E-01,  3.51803132381818E-01)
-
-X( 5) = ( -1.65315696496818E+00, -7.47694866214249E-01)
-
-PATH NUMBER =      3719
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07783782219737E+00, -4.79646292586717E-01)
-X( 2) = (  7.76991590673229E-01,  3.37071009427167E-01)
-X( 3) = ( -3.64958747552190E-01, -3.74682109721156E-01)
-X( 4) = ( -1.90613182165051E-01,  4.31653492806559E-01)
-
-X( 5) = ( -1.15130943022031E+00,  1.03148714294958E-01)
-
-PATH NUMBER =      3720
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.65879114604591E-01, -1.66089659695166E-01)
-X( 2) = (  5.01278400720730E-01,  6.32883853359101E-01)
-X( 3) = ( -2.40833994292418E-02, -3.89396598678962E-01)
-X( 4) = ( -2.13249950306034E-01,  5.16896231562683E-01)
-
-X( 5) = ( -7.98231489858169E-01,  4.59048424374673E-01)
-
-PATH NUMBER =      3721
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.78563450236637E-01,  2.14298649734444E-03)
-X( 2) = (  9.99250127974254E-02,  6.82264616327763E-01)
-X( 3) = (  2.46500557981538E-01, -1.81558100957409E-01)
-X( 4) = ( -2.85383697038789E-01,  5.67645323818683E-01)
-
-X( 5) = ( -5.04756261548928E-01,  6.79747678628116E-01)
-
-PATH NUMBER =      3722
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.50329021609204E-01, -5.36662788602587E-02)
-X( 2) = ( -2.39270862341321E-01,  4.62107490534066E-01)
-X( 3) = (  3.20183883801929E-01,  1.51583440491983E-01)
-X( 4) = ( -3.73262240589764E-01,  5.60154705294643E-01)
-
-X( 5) = ( -2.01519307227591E-01,  8.55532570886179E-01)
-
-PATH NUMBER =      3723
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.34760365796401E-01, -3.07403680256258E-01)
-X( 2) = ( -3.57595704975848E-01,  7.54264419107905E-02)
-X( 3) = (  1.62489330981621E-01,  4.54147395969223E-01)
-X( 4) = ( -4.35766233770236E-01,  4.97929319646912E-01)
-
-X( 5) = (  1.95787210587469E-01,  1.02134412047799E+00)
-
-PATH NUMBER =      3724
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.32724452631785E-01, -6.40342667600365E-01)
-X( 2) = ( -1.99684006203315E-01, -2.96846169410073E-01)
-X( 3) = ( -1.52796066635028E-01,  5.84560728082708E-01)
-X( 4) = ( -4.43649363516555E-01,  4.10085116378193E-01)
-
-X( 5) = (  9.04085252993632E-01,  1.16723543079040E+00)
-
-PATH NUMBER =      3725
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.45173908511733E-01, -8.96697388509591E-01)
-X( 2) = (  1.60575595127566E-01, -4.80519851242274E-01)
-X( 3) = ( -4.78146767496303E-01,  4.81801589353797E-01)
-X( 4) = ( -3.93223025809190E-01,  3.37725374477492E-01)
-
-X( 5) = (  2.88513854674177E+00,  6.27632015111643E-01)
-
-PATH NUMBER =      3726
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.72701271917319E-01, -9.56516620005142E-01)
-X( 2) = (  5.54613627714592E-01, -3.89651646550932E-01)
-X( 3) = ( -6.61327562798944E-01,  1.93952122834363E-01)
-X( 4) = ( -3.08082264487736E-01,  3.14708021369099E-01)
-
-X( 5) = ( -5.82882373995463E-01, -4.28403452699771E+00)
-
-PATH NUMBER =      3727
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10415271031396E+00, -5.85074298456514E-01)
-X( 2) = (  1.09151097413851E+00,  5.48608442625544E-02)
-X( 3) = ( -1.05027716516272E+00, -2.79047380292535E-01)
-X( 4) = ( -3.06762624109557E-01,  2.76589398418911E-01)
-
-X( 5) = ( -2.21293709993805E+00,  1.20893398002628E+00)
-
-PATH NUMBER =      3728
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21993768306144E+00, -2.72910312189684E-01)
-X( 2) = (  1.07044724794638E+00,  4.58691651888451E-01)
-X( 3) = ( -7.98609790121838E-01, -5.09429783013015E-01)
-X( 4) = ( -2.69310418265946E-01,  3.56439758843652E-01)
-
-X( 5) = ( -9.49615027357072E-01,  6.63653202427610E-01)
-
-PATH NUMBER =      3729
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10797897546866E+00,  4.06463207018665E-02)
-X( 2) = (  7.94734057993876E-01,  7.54504495820386E-01)
-X( 3) = ( -4.57734441998889E-01, -5.24144271970822E-01)
-X( 4) = ( -2.91947186406929E-01,  4.41682497599776E-01)
-
-X( 5) = ( -5.11613120203338E-01,  6.22986055582690E-01)
-
-PATH NUMBER =      3730
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.20663311100705E-01,  2.08878966894377E-01)
-X( 2) = (  3.93380670070572E-01,  8.03885258789048E-01)
-X( 3) = ( -1.87150484588110E-01, -3.16305774249269E-01)
-X( 4) = ( -3.64080933139684E-01,  4.92431589855777E-01)
-
-X( 5) = ( -2.53788675439724E-01,  6.30106626485756E-01)
-
-PATH NUMBER =      3731
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.92428882473271E-01,  1.53069701536773E-01)
-X( 2) = (  5.41847949318250E-02,  5.83728132995351E-01)
-X( 3) = ( -1.13467158767719E-01,  1.68357672001222E-02)
-X( 4) = ( -4.51959476690659E-01,  4.84940971331736E-01)
-
-X( 5) = ( -4.56741523371170E-02,  6.52682744897730E-01)
-
-PATH NUMBER =      3732
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.76860226660469E-01, -1.00667699859226E-01)
-X( 2) = ( -6.41400477027020E-02,  1.97047084372075E-01)
-X( 3) = ( -2.71161711588027E-01,  3.19399722677363E-01)
-X( 4) = ( -5.14463469871131E-01,  4.22715585684006E-01)
-
-X( 5) = (  1.70456217934223E-01,  6.92442553265424E-01)
-
-PATH NUMBER =      3733
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.74824313495852E-01, -4.33606687203333E-01)
-X( 2) = (  9.37716510698308E-02, -1.75225526948788E-01)
-X( 3) = ( -5.86447109204675E-01,  4.49813054790848E-01)
-X( 4) = ( -5.22346599617450E-01,  3.34871382415287E-01)
-
-X( 5) = (  4.62021677678949E-01,  7.73726769103082E-01)
-
-PATH NUMBER =      3734
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.87273769375800E-01, -6.89961408112559E-01)
-X( 2) = (  4.54031252400712E-01, -3.58899208780989E-01)
-X( 3) = ( -9.11797810065951E-01,  3.47053916061937E-01)
-X( 4) = ( -4.71920261910085E-01,  2.62511640514585E-01)
-
-X( 5) = (  1.02194572411140E+00,  1.03068182497252E+00)
-
-PATH NUMBER =      3735
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.14801132781386E-01, -7.49780639608110E-01)
-X( 2) = (  8.48069284987738E-01, -2.68031004089647E-01)
-X( 3) = ( -1.09497860536859E+00,  5.92044495425031E-02)
-X( 4) = ( -3.86779500588631E-01,  2.39494287406192E-01)
-
-X( 5) = (  2.43546904666771E+00,  3.72469280288376E+00)
-
-PATH NUMBER =      3736
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12399133670202E+00, -2.87817811060615E-01)
-X( 2) = (  1.22433928965442E+00,  3.82869103346086E-02)
-X( 3) = ( -8.42811480940296E-01, -3.89067881030087E-01)
-X( 4) = ( -5.20341948999837E-01,  7.86921897179691E-04)
-
-X( 5) = ( -7.31004201110081E-01,  5.63845020437746E-01)
-
-PATH NUMBER =      3737
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23977630944951E+00,  2.43461752062135E-02)
-X( 2) = (  1.20327556346229E+00,  4.42117717960506E-01)
-X( 3) = ( -5.91144105899412E-01, -6.19450283750567E-01)
-X( 4) = ( -4.82889743156227E-01,  8.06372823219214E-02)
-
-X( 5) = ( -5.04118652597297E-01,  4.00043045914047E-01)
-
-PATH NUMBER =      3738
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12781760185672E+00,  3.37902808097764E-01)
-X( 2) = (  9.27562373509792E-01,  7.37930561892440E-01)
-X( 3) = ( -2.50268757776465E-01, -6.34164772708374E-01)
-X( 4) = ( -5.05526511297209E-01,  1.65880021078045E-01)
-
-X( 5) = ( -3.47965931515433E-01,  3.83688858187476E-01)
-
-PATH NUMBER =      3739
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.40501937488768E-01,  5.06135454290275E-01)
-X( 2) = (  5.26208985586487E-01,  7.87311324861102E-01)
-X( 3) = (  2.03151996343148E-02, -4.26326274986821E-01)
-X( 4) = ( -5.77660258029965E-01,  2.16629113334046E-01)
-
-X( 5) = ( -2.35622812809105E-01,  4.08458390108066E-01)
-
-PATH NUMBER =      3740
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.12267508861335E-01,  4.50326188932672E-01)
-X( 2) = (  1.87013110447740E-01,  5.67154199067406E-01)
-X( 3) = (  9.39985254547061E-02, -9.31847335374301E-02)
-X( 4) = ( -6.65538801580940E-01,  2.09138494810006E-01)
-
-X( 5) = ( -1.41227344444927E-01,  4.57365019009603E-01)
-
-PATH NUMBER =      3741
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.96698853048532E-01,  1.96588787536672E-01)
-X( 2) = (  6.86882678132135E-02,  1.80473150444130E-01)
-X( 3) = ( -6.36960273656017E-02,  2.09379221939811E-01)
-X( 4) = ( -7.28042794761412E-01,  1.46913109162275E-01)
-
-X( 5) = ( -5.14592780194849E-02,  5.40628708020555E-01)
-
-PATH NUMBER =      3742
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.94662939883915E-01, -1.36350199807435E-01)
-X( 2) = (  2.26599966585746E-01, -1.91799460876734E-01)
-X( 3) = ( -3.78981424982250E-01,  3.39792554053296E-01)
-X( 4) = ( -7.35925924507731E-01,  5.90689058935557E-02)
-
-X( 5) = (  2.91550932160633E-02,  7.00951384546487E-01)
-
-PATH NUMBER =      3743
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07112395763864E-01, -3.92704920716661E-01)
-X( 2) = (  5.86859567916628E-01, -3.75473142708935E-01)
-X( 3) = ( -7.04332125843526E-01,  2.37033415324385E-01)
-X( 4) = ( -6.85499586800366E-01, -1.32908360071459E-02)
-
-X( 5) = ( -2.66108212788671E-02,  1.04024250268784E+00)
-
-PATH NUMBER =      3744
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.34639759169450E-01, -4.52524152212212E-01)
-X( 2) = (  9.80897600503654E-01, -2.84604938017593E-01)
-X( 3) = ( -8.87512921146166E-01, -5.08160511950491E-02)
-X( 4) = ( -6.00358825478912E-01, -3.63081891155386E-02)
-
-X( 5) = ( -6.61601903301760E-01,  1.12834961805166E+00)
-
-PATH NUMBER =      3745
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.48115819208683E-01, -4.73541074744740E-02)
-X( 2) = (  1.33674520201689E+00,  1.10970935777649E-01)
-X( 3) = ( -6.13163731718223E-01, -3.39992102995941E-01)
-X( 4) = ( -5.06670789368108E-01, -3.47776176365433E-01)
-
-X( 5) = ( -3.47899106065166E-01,  4.97068781333078E-01)
-
-PATH NUMBER =      3746
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06390079195617E+00,  2.64809878792355E-01)
-X( 2) = (  1.31568147582476E+00,  5.14801743403546E-01)
-X( 3) = ( -3.61496356677340E-01, -5.70374505716421E-01)
-X( 4) = ( -4.69218583524498E-01, -2.67925815940691E-01)
-
-X( 5) = ( -2.93838166166451E-01,  3.72687405762343E-01)
-
-PATH NUMBER =      3747
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.51942084363385E-01,  5.78366511683906E-01)
-X( 2) = (  1.03996828587226E+00,  8.10614587335481E-01)
-X( 3) = ( -2.06210085543917E-02, -5.85088994674228E-01)
-X( 4) = ( -4.91855351665480E-01, -1.82683077184568E-01)
-
-X( 5) = ( -2.16103826725096E-01,  3.30764927239024E-01)
-
-PATH NUMBER =      3748
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.64626419995431E-01,  7.46599157876416E-01)
-X( 2) = (  6.38614897948956E-01,  8.59995350304143E-01)
-X( 3) = (  2.49962948856387E-01, -3.77250496952676E-01)
-X( 4) = ( -5.63989098398235E-01, -1.31933984928567E-01)
-
-X( 5) = ( -1.49066383208505E-01,  3.28229232684314E-01)
-
-PATH NUMBER =      3749
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.36391991367998E-01,  6.90789892518813E-01)
-X( 2) = (  2.99419022810209E-01,  6.39838224510447E-01)
-X( 3) = (  3.23646274676779E-01, -4.41089555032843E-02)
-X( 4) = ( -6.51867641949211E-01, -1.39424603452607E-01)
-
-X( 5) = ( -9.13529882031464E-02,  3.48511998731466E-01)
-
-PATH NUMBER =      3750
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.20823335555195E-01,  4.37052491122813E-01)
-X( 2) = (  1.81094180175682E-01,  2.53157175887170E-01)
-X( 3) = (  1.65951721856471E-01,  2.58454999973957E-01)
-X( 4) = ( -7.14371635129683E-01, -2.01649989100338E-01)
-
-X( 5) = ( -4.07383158489974E-02,  3.92304358986471E-01)
-
-PATH NUMBER =      3751
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18787422390578E-01,  1.04113503778707E-01)
-X( 2) = (  3.39005878948215E-01, -1.19115435433693E-01)
-X( 3) = ( -1.49333675760177E-01,  3.88868332087442E-01)
-X( 4) = ( -7.22254764876002E-01, -2.89494192369057E-01)
-
-X( 5) = ( -6.30656154117989E-03,  4.73193497183862E-01)
-
-PATH NUMBER =      3752
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.31236878270527E-01, -1.52241217130519E-01)
-X( 2) = (  6.99265480279096E-01, -3.02789117265894E-01)
-X( 3) = ( -4.74684376621453E-01,  2.86109193358531E-01)
-X( 4) = ( -6.71828427168637E-01, -3.61853934269759E-01)
-
-X( 5) = ( -4.09675173650242E-02,  6.03484522949190E-01)
-
-PATH NUMBER =      3753
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.58764241676112E-01, -2.12060448626071E-01)
-X( 2) = (  1.09330351286612E+00, -2.11920912574552E-01)
-X( 3) = ( -6.57865171924093E-01, -1.74027316090305E-03)
-X( 4) = ( -5.86687665847182E-01, -3.84871287378151E-01)
-
-X( 5) = ( -2.32105688737713E-01,  6.60076596764668E-01)
-
-PATH NUMBER =      3754
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.58820267107729E-01,  2.38011729375739E-02)
-X( 2) = (  1.37613273557895E+00,  2.38903257293915E-01)
-X( 3) = ( -4.68788651607950E-01, -1.54783148148794E-01)
-X( 4) = ( -2.72146032744071E-01, -6.06003348844520E-01)
-
-X( 5) = ( -1.40055873137772E-01,  4.75805321273411E-01)
-
-PATH NUMBER =      3755
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.74605239855215E-01,  3.35965159204403E-01)
-X( 2) = (  1.35506900938682E+00,  6.42734064919812E-01)
-X( 3) = ( -2.17121276567066E-01, -3.85165550869274E-01)
-X( 4) = ( -2.34693826900461E-01, -5.26152988419778E-01)
-
-X( 5) = ( -1.58139515665334E-01,  3.81122084720794E-01)
-
-PATH NUMBER =      3756
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.62646532262431E-01,  6.49521792095954E-01)
-X( 2) = (  1.07935581943432E+00,  9.38546908851746E-01)
-X( 3) = (  1.23754071555882E-01, -3.99880039827081E-01)
-X( 4) = ( -2.57330595041443E-01, -4.40910249663655E-01)
-
-X( 5) = ( -1.21200255064856E-01,  3.24779463780458E-01)
-
-PATH NUMBER =      3757
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.75330867894478E-01,  8.17754438288464E-01)
-X( 2) = (  6.78002431511015E-01,  9.87927671820408E-01)
-X( 3) = (  3.94338028966661E-01, -1.92041542105528E-01)
-X( 4) = ( -3.29464341774198E-01, -3.90161157407654E-01)
-
-X( 5) = ( -7.51453787787047E-02,  3.02955361115776E-01)
-
-PATH NUMBER =      3758
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.70964392670439E-02,  7.61945172930861E-01)
-X( 2) = (  3.38806556372269E-01,  7.67770546026712E-01)
-X( 3) = (  4.68021354787053E-01,  1.41099999343863E-01)
-X( 4) = ( -4.17342885325173E-01, -3.97651775931694E-01)
-
-X( 5) = ( -3.03927935168882E-02,  3.02885643901079E-01)
-
-PATH NUMBER =      3759
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.68472216545759E-01,  5.08207771534861E-01)
-X( 2) = (  2.20481713737742E-01,  3.81089497403436E-01)
-X( 3) = (  3.10326801966745E-01,  4.43663954821104E-01)
-X( 4) = ( -4.79846878505645E-01, -4.59877161579425E-01)
-
-X( 5) = (  1.17929970926946E-02,  3.21562069302855E-01)
-
-PATH NUMBER =      3760
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.70508129710375E-01,  1.75268784190755E-01)
-X( 2) = (  3.78393412510275E-01,  8.81688608257273E-03)
-X( 3) = ( -4.95859564990350E-03,  5.74077286934589E-01)
-X( 4) = ( -4.87730008251964E-01, -5.47721364848144E-01)
-
-X( 5) = (  4.70184753623655E-02,  3.64759964640808E-01)
-
-PATH NUMBER =      3761
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.19413261695729E-02, -8.10859367184717E-02)
-X( 2) = (  7.38653013841155E-01, -1.74856795749629E-01)
-X( 3) = ( -3.30309296511179E-01,  4.71318148205678E-01)
-X( 4) = ( -4.37303670544600E-01, -6.20081106748846E-01)
-
-X( 5) = (  5.21663318164393E-02,  4.41618212471304E-01)
-
-PATH NUMBER =      3762
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.69468689575159E-01, -1.40905168214023E-01)
-X( 2) = (  1.13269104642818E+00, -8.39885910582866E-02)
-X( 3) = ( -5.13490091813819E-01,  1.83468681686244E-01)
-X( 4) = ( -3.52162909223145E-01, -6.43098459857238E-01)
-
-X( 5) = ( -2.62717013253609E-02,  5.16244671974521E-01)
-
-PATH NUMBER =      3763
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.91469284389121E-01, -1.07646316332125E-01)
-X( 2) = (  1.32407202564324E+00,  3.62222919836565E-01)
-X( 3) = ( -4.77240945143357E-01,  7.98976551701235E-02)
-X( 4) = (  7.34955807955500E-02, -6.53067231661767E-01)
-
-X( 5) = (  2.04465360277775E-02,  4.66439684003718E-01)
-
-PATH NUMBER =      3764
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07254257136607E-01,  2.04517669934705E-01)
-X( 2) = (  1.30300829945111E+00,  7.66053727462462E-01)
-X( 3) = ( -2.25573570102474E-01, -1.50484747550357E-01)
-X( 4) = (  1.10947786639160E-01, -5.73216871237026E-01)
-
-X( 5) = ( -4.39562546013133E-02,  4.04368183625690E-01)
-
-PATH NUMBER =      3765
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.95295549543823E-01,  5.18074302826256E-01)
-X( 2) = (  1.02729510949861E+00,  1.06186657139440E+00)
-X( 3) = (  1.15301778020474E-01, -1.65199236508164E-01)
-X( 4) = (  8.83110184981778E-02, -4.87974132480902E-01)
-
-X( 5) = ( -4.02731284393248E-02,  3.39058698390566E-01)
-
-PATH NUMBER =      3766
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07979885175869E-01,  6.86306949018766E-01)
-X( 2) = (  6.25941721575304E-01,  1.11124733436306E+00)
-X( 3) = (  3.85885735431254E-01,  4.26392612133890E-02)
-X( 4) = (  1.61772717654226E-02, -4.37225040224902E-01)
-
-X( 5) = ( -9.83165676781466E-03,  3.01322311451661E-01)
-
-PATH NUMBER =      3767
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.20254543451564E-01,  6.30497683661163E-01)
-X( 2) = (  2.86745846436557E-01,  8.91090208569362E-01)
-X( 3) = (  4.59569061251645E-01,  3.75780802662780E-01)
-X( 4) = ( -7.17012717855524E-02, -4.44715658748942E-01)
-
-X( 5) = (  2.75069151063180E-02,  2.85171677106665E-01)
-
-PATH NUMBER =      3768
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.35823199264367E-01,  3.76760282265163E-01)
-X( 2) = (  1.68421003802030E-01,  5.04409159946086E-01)
-X( 3) = (  3.01874508431337E-01,  6.78344758140021E-01)
-X( 4) = ( -1.34205264966024E-01, -5.06941044396673E-01)
-
-X( 5) = (  6.71660379963947E-02,  2.86234254305610E-01)
-
-PATH NUMBER =      3769
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.37859112428984E-01,  4.38212949210569E-02)
-X( 2) = (  3.26332702574563E-01,  1.32136548625223E-01)
-X( 3) = ( -1.34108891853112E-02,  8.08758090253506E-01)
-X( 4) = ( -1.42088394712343E-01, -5.94785247665392E-01)
-
-X( 5) = (  1.07007145790811E-01,  3.07279298531568E-01)
-
-PATH NUMBER =      3770
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.25409656549036E-01, -2.12533425988170E-01)
-X( 2) = (  6.86592303905443E-01, -5.15371332069779E-02)
-X( 3) = ( -3.38761590046587E-01,  7.05998951524595E-01)
-X( 4) = ( -9.16620570049785E-02, -6.67144989566094E-01)
-
-X( 5) = (  1.36162384427692E-01,  3.58270430983859E-01)
-
-PATH NUMBER =      3771
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02117706856551E-01, -2.72352657483721E-01)
-X( 2) = (  1.08063033649247E+00,  3.93310714843636E-02)
-X( 3) = ( -5.21942385349227E-01,  4.18149485005162E-01)
-X( 4) = ( -6.52129568352430E-03, -6.90162342674486E-01)
-
-X( 5) = (  1.15525909258336E-01,  4.37263158745707E-01)
-
-PATH NUMBER =      3772
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.71159367142100E-01, -3.80190834178160E-01)
-X( 2) = (  1.20492285697902E+00,  4.23227282756510E-01)
-X( 3) = ( -6.34565690242450E-01,  2.54240550901284E-01)
-X( 4) = (  3.68524498896920E-01, -4.66946110990191E-01)
-
-X( 5) = (  1.81689708654791E-01,  4.63174039113802E-01)
-
-PATH NUMBER =      3773
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.86944339889585E-01, -6.80268479113301E-02)
-X( 2) = (  1.18385913078689E+00,  8.27058090382407E-01)
-X( 3) = ( -3.82898315201567E-01,  2.38581481808032E-02)
-X( 4) = (  4.05976704740530E-01, -3.87095750565450E-01)
-
-X( 5) = (  7.68556301971851E-02,  4.46450259784575E-01)
-
-PATH NUMBER =      3774
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.74985632296802E-01,  2.45529784980220E-01)
-X( 2) = (  9.08145940834386E-01,  1.12287093431434E+00)
-X( 3) = ( -4.20229670786188E-02,  9.14365922299649E-03)
-X( 4) = (  3.83339936599548E-01, -3.01853011809326E-01)
-
-X( 5) = (  4.17795586440677E-02,  3.74177511510346E-01)
-
-PATH NUMBER =      3775
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.23300320711520E-02,  4.13762431172731E-01)
-X( 2) = (  5.06792552911081E-01,  1.17225169728300E+00)
-X( 3) = (  2.28560990332161E-01,  2.16982156944549E-01)
-X( 4) = (  3.11206189866793E-01, -2.51103919553326E-01)
-
-X( 5) = (  5.56256844615071E-02,  3.18533126084486E-01)
-
-PATH NUMBER =      3776
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.40564460698585E-01,  3.57953165815128E-01)
-X( 2) = (  1.67596677772335E-01,  9.52094571489307E-01)
-X( 3) = (  3.02244316152552E-01,  5.50123698393941E-01)
-X( 4) = (  2.23327646315817E-01, -2.58594538077366E-01)
-
-X( 5) = (  8.68684392898649E-02,  2.85520448777737E-01)
-
-PATH NUMBER =      3777
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.56133116511388E-01,  1.04215764419128E-01)
-X( 2) = (  4.92718351378079E-02,  5.65413522866031E-01)
-X( 3) = (  1.44549763332244E-01,  8.52687653871181E-01)
-X( 4) = (  1.60823653135345E-01, -3.20819923725097E-01)
-
-X( 5) = (  1.25793906935013E-01,  2.70071617173679E-01)
-
-PATH NUMBER =      3778
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.58169029676005E-01, -2.28723222924978E-01)
-X( 2) = (  2.07183533910341E-01,  1.93140911545168E-01)
-X( 3) = ( -1.70735634284404E-01,  9.83100985984666E-01)
-X( 4) = (  1.52940523389026E-01, -4.08664126993816E-01)
-
-X( 5) = (  1.70868356117352E-01,  2.72586756208748E-01)
-
-PATH NUMBER =      3779
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.45719573796057E-01, -4.85077943834205E-01)
-X( 2) = (  5.67443135241222E-01,  9.46722971296630E-03)
-X( 3) = ( -4.96086335145680E-01,  8.80341847255756E-01)
-X( 4) = (  2.03366861096391E-01, -4.81023868894517E-01)
-
-X( 5) = (  2.18696162621866E-01,  3.02864507015110E-01)
-
-PATH NUMBER =      3780
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.81922103904709E-02, -5.44897175329756E-01)
-X( 2) = (  9.61481167828248E-01,  1.00335434404308E-01)
-X( 3) = ( -6.79267130448320E-01,  5.92492380736322E-01)
-X( 4) = (  2.88507622417846E-01, -5.04041222002910E-01)
-
-X( 5) = (  2.43661295056474E-01,  3.77944843132974E-01)
-
-PATH NUMBER =      3781
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.54184862742338E-01, -6.66305771705454E-01)
-X( 2) = (  1.07443644979979E+00,  3.93371726655533E-01)
-X( 3) = ( -8.67148890203583E-01,  2.86668560526620E-01)
-X( 4) = (  4.74893411899216E-01, -1.34728127697869E-01)
-
-X( 5) = (  3.92714923796061E-01,  4.68182277925144E-01)
-
-PATH NUMBER =      3782
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.69969835489824E-01, -3.54141785438625E-01)
-X( 2) = (  1.05337272360765E+00,  7.97202534281430E-01)
-X( 3) = ( -6.15481515162699E-01,  5.62861578061398E-02)
-X( 4) = (  5.12345617742826E-01, -5.48777672731272E-02)
-
-X( 5) = (  2.38128958067388E-01,  5.36019834094564E-01)
-
-PATH NUMBER =      3783
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.58011127897040E-01, -4.05851525470737E-02)
-X( 2) = (  7.77659533655152E-01,  1.09301537821336E+00)
-X( 3) = ( -2.74606167039750E-01,  4.15716688483330E-02)
-X( 4) = (  4.89708849601844E-01,  3.03649714829962E-02)
-
-X( 5) = (  1.37169953424308E-01,  4.52948290473532E-01)
-
-PATH NUMBER =      3784
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.06954635290860E-02,  1.27647493645437E-01)
-X( 2) = (  3.76306145731847E-01,  1.14239614118203E+00)
-X( 3) = ( -4.02220962897115E-03,  2.49410166569886E-01)
-X( 4) = (  4.17575102869089E-01,  8.11140637389969E-02)
-
-X( 5) = (  1.28299823092065E-01,  3.66786836429107E-01)
-
-PATH NUMBER =      3785
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.57538965098348E-01,  7.18382282878335E-02)
-X( 2) = (  3.71102705931002E-02,  9.22239015388330E-01)
-X( 3) = (  6.96611161914202E-02,  5.82551708019278E-01)
-X( 4) = (  3.29696559318114E-01,  7.36234452149567E-02)
-
-X( 5) = (  1.54457534728092E-01,  3.09192022814516E-01)
-
-PATH NUMBER =      3786
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.73107620911150E-01, -1.81899173108166E-01)
-X( 2) = ( -8.12145720414264E-02,  5.35557966765054E-01)
-X( 3) = ( -8.80334366288875E-02,  8.85115663496518E-01)
-X( 4) = (  2.67192566137642E-01,  1.13980595672258E-02)
-
-X( 5) = (  1.95109009953136E-01,  2.72753715602150E-01)
-
-PATH NUMBER =      3787
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.75143534075767E-01, -5.14838160452273E-01)
-X( 2) = (  7.66971267311063E-02,  1.63285355444191E-01)
-X( 3) = ( -4.03318834245536E-01,  1.01552899561000E+00)
-X( 4) = (  2.59309436391323E-01, -7.64461437014929E-02)
-
-X( 5) = (  2.47898821402034E-01,  2.53914110969427E-01)
-
-PATH NUMBER =      3788
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.62694078195819E-01, -7.71192881361499E-01)
-X( 2) = (  4.36956728061987E-01, -2.03883263880105E-02)
-X( 3) = ( -7.28669535106811E-01,  9.12769856881092E-01)
-X( 4) = (  3.09735774098687E-01, -1.48805885602194E-01)
-
-X( 5) = (  3.16033134530590E-01,  2.60381244723194E-01)
-
-PATH NUMBER =      3789
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.48332852097677E-02, -8.31012112857050E-01)
-X( 2) = (  8.30994760649013E-01,  7.04798783033315E-02)
-X( 3) = ( -9.11850330409452E-01,  6.24920390361658E-01)
-X( 4) = (  3.94876535420142E-01, -1.71823238710587E-01)
-
-X( 5) = (  3.91904305521644E-01,  3.22166347563995E-01)
-
-PATH NUMBER =      3790
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.01697219072883E-01, -8.32114769831654E-01)
-X( 2) = (  9.93668844219581E-01,  2.86625998040828E-01)
-X( 3) = ( -1.06616228089060E+00,  1.62008257945256E-01)
-X( 4) = (  3.42831123249876E-01,  1.88138231641110E-01)
-
-X( 5) = (  7.88368966036894E-01,  5.06129228177353E-01)
-
-PATH NUMBER =      3791
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.17482191820368E-01, -5.19950783564825E-01)
-X( 2) = (  9.72605118027447E-01,  6.90456805666725E-01)
-X( 3) = ( -8.14494905849716E-01, -6.83741447752244E-02)
-X( 4) = (  3.80283329093487E-01,  2.67988592065852E-01)
-
-X( 5) = (  5.05210806850257E-01,  8.26143627317035E-01)
-
-PATH NUMBER =      3792
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.05523484227585E-01, -2.06394150673274E-01)
-X( 2) = (  6.96891928074948E-01,  9.86269649598660E-01)
-X( 3) = ( -4.73619557726768E-01, -8.30886337330316E-02)
-X( 4) = (  3.57646560952504E-01,  3.53231330821975E-01)
-
-X( 5) = (  2.27199890336144E-01,  6.65872531362953E-01)
-
-PATH NUMBER =      3793
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.18207819859631E-01, -3.81615044807634E-02)
-X( 2) = (  2.95538540151644E-01,  1.03565041256732E+00)
-X( 3) = ( -2.03035600315989E-01,  1.24749863988522E-01)
-X( 4) = (  2.85512814219749E-01,  4.03980423077976E-01)
-
-X( 5) = (  1.95884672880343E-01,  4.92916575169816E-01)
-
-PATH NUMBER =      3794
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.00266087678026E-02, -9.39707698383667E-02)
-X( 2) = ( -4.36573349871034E-02,  8.15493286773625E-01)
-X( 3) = ( -1.29352274495597E-01,  4.57891405437913E-01)
-X( 4) = (  1.97634270668774E-01,  3.96489804553936E-01)
-
-X( 5) = (  2.30153240691090E-01,  3.86001213570927E-01)
-
-PATH NUMBER =      3795
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.25595264580605E-01, -3.47708171234366E-01)
-X( 2) = ( -1.61982177621630E-01,  4.28812238150350E-01)
-X( 3) = ( -2.87046827315905E-01,  7.60455360915154E-01)
-X( 4) = (  1.35130277488302E-01,  3.34264418906205E-01)
-
-X( 5) = (  2.84580272985145E-01,  3.14584982683970E-01)
-
-PATH NUMBER =      3796
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.27631177745222E-01, -6.80647158578473E-01)
-X( 2) = ( -4.07047884909735E-03,  5.65396268294862E-02)
-X( 3) = ( -6.02332224932554E-01,  8.90868693028638E-01)
-X( 4) = (  1.27247147741983E-01,  2.46420215637486E-01)
-
-X( 5) = (  3.56723100117290E-01,  2.63197280967124E-01)
-
-PATH NUMBER =      3797
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.51817218652734E-02, -9.37001879487699E-01)
-X( 2) = (  3.56189122481784E-01, -1.27134055002715E-01)
-X( 3) = ( -9.27682925793829E-01,  7.88109554299728E-01)
-X( 4) = (  1.77673485449347E-01,  1.74060473736784E-01)
-
-X( 5) = (  4.59907637379639E-01,  2.32637764961116E-01)
-
-PATH NUMBER =      3798
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.12345641540312E-01, -9.96821110983250E-01)
-X( 2) = (  7.50227155068810E-01, -3.62658503113735E-02)
-X( 3) = ( -1.11086372109647E+00,  5.00260087780294E-01)
-X( 4) = (  2.62814246770802E-01,  1.51043120628391E-01)
-
-X( 5) = (  6.20979025328310E-01,  2.60597563306330E-01)
-
-PATH NUMBER =      3799
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.97882653813241E-01, -8.00033955571761E-01)
-X( 2) = (  1.00041210052133E+00,  1.52937609677843E-01)
-X( 3) = ( -1.13848528501358E+00, -6.14104158200503E-02)
-X( 4) = (  3.41310455167774E-02,  3.50580209232147E-01)
-
-X( 5) = (  2.40135564151863E+00,  1.08854805988796E+00)
-
-PATH NUMBER =      3800
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01366762656073E+00, -4.87869969304931E-01)
-X( 2) = (  9.79348374329201E-01,  5.56768417303740E-01)
-X( 3) = ( -8.86817909972696E-01, -2.91792818540531E-01)
-X( 4) = (  7.15832513603879E-02,  4.30430569656889E-01)
-
-X( 5) = ( -6.60034875198960E-02,  2.16757434911746E+00)
-
-PATH NUMBER =      3801
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.01708918967943E-01, -1.74313336413380E-01)
-X( 2) = (  7.03635184376702E-01,  8.52581261235675E-01)
-X( 3) = ( -5.45942561849748E-01, -3.06507307498338E-01)
-X( 4) = (  4.89464832194054E-02,  5.15673308413012E-01)
-
-X( 5) = ( -1.08482924446511E-01,  1.06994783227010E+00)
-
-PATH NUMBER =      3802
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.14393254599989E-01, -6.08069022086993E-03)
-X( 2) = (  3.02281796453397E-01,  9.01962024204337E-01)
-X( 3) = ( -2.75358604438969E-01, -9.86688097767844E-02)
-X( 4) = ( -2.31872635133497E-02,  5.66422400669013E-01)
-
-X( 5) = (  7.99437535160860E-02,  7.42150048371832E-01)
-
-PATH NUMBER =      3803
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.86158825972556E-01, -6.18899555784734E-02)
-X( 2) = ( -3.69140786853498E-02,  6.81804898410640E-01)
-X( 3) = ( -2.01675278618577E-01,  2.34472731672607E-01)
-X( 4) = ( -1.11065807064325E-01,  5.58931782144973E-01)
-
-X( 5) = (  2.28512335377217E-01,  5.80707016351483E-01)
-
-PATH NUMBER =      3804
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.05901701597533E-02, -3.15627356974473E-01)
-X( 2) = ( -1.55238921319876E-01,  2.95123849787364E-01)
-X( 3) = ( -3.59369831438885E-01,  5.37036687149848E-01)
-X( 4) = ( -1.73569800244797E-01,  4.96706396497242E-01)
-
-X( 5) = (  3.64509843936595E-01,  4.70623048932113E-01)
-
-PATH NUMBER =      3805
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.85542569951366E-02, -6.48566344318580E-01)
-X( 2) = (  2.67277745265629E-03, -7.71487615334990E-02)
-X( 3) = ( -6.74655229055534E-01,  6.67450019263332E-01)
-X( 4) = ( -1.81452929991116E-01,  4.08862193228523E-01)
-
-X( 5) = (  5.17682148885500E-01,  3.76947908615736E-01)
-
-PATH NUMBER =      3806
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.81003712875085E-01, -9.04921065227806E-01)
-X( 2) = (  3.62932378783538E-01, -2.60822443365700E-01)
-X( 3) = ( -1.00000592991681E+00,  5.64690880534422E-01)
-X( 4) = ( -1.31026592283751E-01,  3.36502451327821E-01)
-
-X( 5) = (  7.38129374924629E-01,  2.85410028370316E-01)
-
-PATH NUMBER =      3807
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.08531076280671E-01, -9.64740296723357E-01)
-X( 2) = (  7.56970411370564E-01, -1.69954238674359E-01)
-X( 3) = ( -1.18318672521945E+00,  2.76841414014988E-01)
-X( 4) = ( -4.58858309622969E-02,  3.13485098219429E-01)
-
-X( 5) = (  1.18246161731362E+00,  2.23818000869753E-01)
-
-PATH NUMBER =      3808
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06028156603318E+00, -6.32621806974908E-01)
-X( 2) = (  1.10530649212228E+00,  3.53231256004125E-01)
-X( 3) = ( -1.50332468597228E+00, -5.50995102994843E-01)
-X( 4) = ( -1.05122423353572E-01,  4.44189203709897E-01)
-
-X( 5) = (  1.80282098733272E+00, -1.99945157568410E-01)
-
-PATH NUMBER =      3809
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17606653878067E+00, -3.20457820708078E-01)
-X( 2) = (  1.08424276593015E+00,  7.57062063630023E-01)
-X( 3) = ( -1.25165731093140E+00, -7.81377505715324E-01)
-X( 4) = ( -6.76702175099620E-02,  5.24039564134638E-01)
-
-X( 5) = (  1.98723936734281E+00,  2.56812435390954E+00)
-
-PATH NUMBER =      3810
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06410783118788E+00, -6.90118781652696E-03)
-X( 2) = (  8.08529575977651E-01,  1.05287490756196E+00)
-X( 3) = ( -9.10781962808447E-01, -7.96091994673131E-01)
-X( 4) = ( -9.03069856509445E-02,  6.09282302890762E-01)
-
-X( 5) = (  2.12006033093430E-01,  1.38036555895318E+00)
-
-PATH NUMBER =      3811
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.76792166819929E-01,  1.61331458375983E-01)
-X( 2) = (  4.07176188054347E-01,  1.10225567053062E+00)
-X( 3) = ( -6.40198005397668E-01, -5.88253496951578E-01)
-X( 4) = ( -1.62440732383699E-01,  6.60031395146763E-01)
-
-X( 5) = (  2.54009417723597E-01,  8.18324264918322E-01)
-
-PATH NUMBER =      3812
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.48557738192496E-01,  1.05522193018380E-01)
-X( 2) = (  6.79803129155998E-02,  8.82098544736922E-01)
-X( 3) = ( -5.66514679577277E-01, -2.55111955502186E-01)
-X( 4) = ( -2.50319275934675E-01,  6.52540776622723E-01)
-
-X( 5) = (  3.51498099787803E-01,  5.67268097634453E-01)
-
-PATH NUMBER =      3813
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.32989082379693E-01, -1.48215208377620E-01)
-X( 2) = ( -5.03445297189271E-02,  4.95417496113647E-01)
-X( 3) = ( -7.24209232397585E-01,  4.74519999750546E-02)
-X( 4) = ( -3.12823269115147E-01,  5.90315390974992E-01)
-
-X( 5) = (  4.47771335494831E-01,  4.03979272728611E-01)
-
-PATH NUMBER =      3814
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.30953169215076E-01, -4.81154195721727E-01)
-X( 2) = (  1.07567169053606E-01,  1.23144884792783E-01)
-X( 3) = ( -1.03949463001423E+00,  1.77865332088539E-01)
-X( 4) = ( -3.20706398861466E-01,  5.02471187706273E-01)
-
-X( 5) = (  5.55207010361344E-01,  2.66002824734770E-01)
-
-PATH NUMBER =      3815
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.43402625095025E-01, -7.37508916630953E-01)
-X( 2) = (  4.67826770384487E-01, -6.05287970394182E-02)
-X( 3) = ( -1.36484533087551E+00,  7.51061933596286E-02)
-X( 4) = ( -2.70280061154101E-01,  4.30111445805571E-01)
-
-X( 5) = (  7.03135259927658E-01,  1.21349192105047E-01)
-
-PATH NUMBER =      3816
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.70929988500611E-01, -7.97328148126504E-01)
-X( 2) = (  8.61864802971513E-01,  3.03394076519238E-02)
-X( 3) = ( -1.54802612617815E+00, -2.12743273159805E-01)
-X( 4) = ( -1.85139299832647E-01,  4.07094092697179E-01)
-
-X( 5) = (  9.77693370977513E-01, -6.02833490046567E-02)
-
-PATH NUMBER =      3817
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08012019242124E+00, -3.35365319579010E-01)
-X( 2) = (  1.23813480763820E+00,  3.36657322076179E-01)
-X( 3) = ( -1.29585900174985E+00, -6.61015603732395E-01)
-X( 4) = ( -3.18701748243853E-01,  1.68386727188166E-01)
-
-X( 5) = (  2.24981026081156E-01,  2.41408042293473E+00)
-
-PATH NUMBER =      3818
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19590516516873E+00, -2.32013333121805E-02)
-X( 2) = (  1.21707108144607E+00,  7.40488129702076E-01)
-X( 3) = ( -1.04419162670897E+00, -8.91398006452876E-01)
-X( 4) = ( -2.81249542400243E-01,  2.48237087612908E-01)
-
-X( 5) = ( -5.22808401351228E-01,  1.16374195759848E+00)
-
-PATH NUMBER =      3819
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08394645757595E+00,  2.90355299579370E-01)
-X( 2) = (  9.41357891493566E-01,  1.03630097363401E+00)
-X( 3) = ( -7.03316278586023E-01, -9.06112495410683E-01)
-X( 4) = ( -3.03886310541225E-01,  3.33479826369031E-01)
-
-X( 5) = ( -2.58480040959240E-01,  7.60145194498535E-01)
-
-PATH NUMBER =      3820
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.96630793207992E-01,  4.58587945771881E-01)
-X( 2) = (  5.40004503570262E-01,  1.08568173660267E+00)
-X( 3) = ( -4.32732321175243E-01, -6.98273997689130E-01)
-X( 4) = ( -3.76020057273980E-01,  3.84228918625032E-01)
-
-X( 5) = ( -6.43865228341371E-02,  6.23848952452680E-01)
-
-PATH NUMBER =      3821
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.68396364580559E-01,  4.02778680414278E-01)
-X( 2) = (  2.00808628431515E-01,  8.65524610808977E-01)
-X( 3) = ( -3.59048995354852E-01, -3.65132456239739E-01)
-X( 4) = ( -4.63898600824955E-01,  3.76738300100992E-01)
-
-X( 5) = (  8.95017753908833E-02,  5.58656093591265E-01)
-
-PATH NUMBER =      3822
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.52827708767756E-01,  1.49041279018278E-01)
-X( 2) = (  8.24837857969882E-02,  4.78843562185701E-01)
-X( 3) = ( -5.16743548175160E-01, -6.25685007624979E-02)
-X( 4) = ( -5.26402594005428E-01,  3.14512914453261E-01)
-
-X( 5) = (  2.38596377618906E-01,  5.23232771709065E-01)
-
-PATH NUMBER =      3823
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.50791795603140E-01, -1.83897708325828E-01)
-X( 2) = (  2.40395484569521E-01,  1.06570950864838E-01)
-X( 3) = ( -8.32028945791808E-01,  6.78448313509870E-02)
-X( 4) = ( -5.34285723751747E-01,  2.26668711184542E-01)
-
-X( 5) = (  4.17305170593611E-01,  5.12573441310101E-01)
-
-PATH NUMBER =      3824
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.63241251483088E-01, -4.40252429235055E-01)
-X( 2) = (  6.00655085900402E-01, -7.71027309673637E-02)
-X( 3) = ( -1.15737964665308E+00, -3.49143073779240E-02)
-X( 4) = ( -4.83859386044382E-01,  1.54308969283840E-01)
-
-X( 5) = (  6.89870011020612E-01,  5.61930648596805E-01)
-
-PATH NUMBER =      3825
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.90768614888674E-01, -5.00071660730606E-01)
-X( 2) = (  9.94693118487428E-01,  1.37654737239782E-02)
-X( 3) = ( -1.34056044195572E+00, -3.22763773897358E-01)
-X( 4) = ( -3.98718624722927E-01,  1.31291616175447E-01)
-
-X( 5) = (  1.19456968931312E+00,  9.58469540929336E-01)
-
-PATH NUMBER =      3826
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.04244674927907E-01, -9.49016159928679E-02)
-X( 2) = (  1.35054072000067E+00,  4.09341347519220E-01)
-X( 3) = ( -1.06621125252778E+00, -6.11939825698250E-01)
-X( 4) = ( -3.05030588612124E-01, -1.80176371074447E-01)
-
-X( 5) = ( -4.05599022229430E-02,  9.07753210987337E-01)
-
-PATH NUMBER =      3827
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02002964767539E+00,  2.17262370273961E-01)
-X( 2) = (  1.32947699380853E+00,  8.13172155145118E-01)
-X( 3) = ( -8.14543877486898E-01, -8.42322228418730E-01)
-X( 4) = ( -2.67578382768513E-01, -1.00326010649706E-01)
-
-X( 5) = ( -1.91163004077590E-01,  6.56733084257561E-01)
-
-PATH NUMBER =      3828
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.08070940082608E-01,  5.30819003165513E-01)
-X( 2) = (  1.05376380385603E+00,  1.10898499907705E+00)
-X( 3) = ( -4.73668529363949E-01, -8.57036717376537E-01)
-X( 4) = ( -2.90215150909496E-01, -1.50832718935821E-02)
-
-X( 5) = ( -1.31009712394468E-01,  5.01094791924054E-01)
-
-PATH NUMBER =      3829
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.20755275714656E-01,  6.99051649358023E-01)
-X( 2) = (  6.52410415932731E-01,  1.15836576204571E+00)
-X( 3) = ( -2.03084571953171E-01, -6.49198219654984E-01)
-X( 4) = ( -3.62348897642251E-01,  3.56658203624187E-02)
-
-X( 5) = ( -4.79380796959600E-02,  4.34305050441693E-01)
-
-PATH NUMBER =      3830
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.92520847087222E-01,  6.43242384000419E-01)
-X( 2) = (  3.13214540793983E-01,  9.38208636252018E-01)
-X( 3) = ( -1.29401246132779E-01, -3.16056678205593E-01)
-X( 4) = ( -4.50227441193226E-01,  2.81752018383786E-02)
-
-X( 5) = (  3.22424941508931E-02,  4.08304967169895E-01)
-
-PATH NUMBER =      3831
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.69521912744191E-02,  3.89504982604420E-01)
-X( 2) = (  1.94889698159457E-01,  5.51527587628742E-01)
-X( 3) = ( -2.87095798953087E-01, -1.34927227283520E-02)
-X( 4) = ( -5.12731434373698E-01, -3.40501838093523E-02)
-
-X( 5) = (  1.14059695966481E-01,  4.08496719534012E-01)
-
-PATH NUMBER =      3832
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.49162781098024E-02,  5.65659952603130E-02)
-X( 2) = (  3.52801396931989E-01,  1.79254976307878E-01)
-X( 3) = ( -6.02381196569735E-01,  1.16920609385133E-01)
-X( 4) = ( -5.20614564120017E-01, -1.21894387078071E-01)
-
-X( 5) = (  2.05629948490525E-01,  4.41213774872359E-01)
-
-PATH NUMBER =      3833
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.87365733989751E-01, -1.99788725648913E-01)
-X( 2) = (  7.13060998262870E-01, -4.41870552432270E-03)
-X( 3) = ( -9.27731897431010E-01,  1.41614706562218E-02)
-X( 4) = ( -4.70188226412653E-01, -1.94254128978773E-01)
-
-X( 5) = (  3.04988033472493E-01,  5.44058452256710E-01)
-
-PATH NUMBER =      3834
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.14893097395337E-01, -2.59607957144464E-01)
-X( 2) = (  1.10709903084990E+00,  8.64494991670191E-02)
-X( 3) = ( -1.11091269273365E+00, -2.73687995863212E-01)
-X( 4) = ( -3.85047465091198E-01, -2.17271482087166E-01)
-
-X( 5) = (  3.05217881933912E-01,  7.93931902980154E-01)
-
-PATH NUMBER =      3835
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.14949122826954E-01, -2.37463355808198E-02)
-X( 2) = (  1.38992825356273E+00,  5.37273669035486E-01)
-X( 3) = ( -9.21836172417507E-01, -4.26730870851103E-01)
-X( 4) = ( -7.05058319880869E-02, -4.38403543553534E-01)
-
-X( 5) = (  1.11107969769994E-01,  5.72536947798186E-01)
-
-PATH NUMBER =      3836
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.30734095574439E-01,  2.88417650686009E-01)
-X( 2) = (  1.36886452737059E+00,  9.41104476661383E-01)
-X( 3) = ( -6.70168797376624E-01, -6.57113273571583E-01)
-X( 4) = ( -3.30536261444766E-02, -3.58553183128792E-01)
-
-X( 5) = ( -8.30886882718055E-03,  5.02995664431446E-01)
-
-PATH NUMBER =      3837
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.18775387981656E-01,  6.01974283577560E-01)
-X( 2) = (  1.09315133741809E+00,  1.23691732059332E+00)
-X( 3) = ( -3.29293449253675E-01, -6.71827762529389E-01)
-X( 4) = ( -5.56903942854589E-02, -2.73310444372669E-01)
-
-X( 5) = ( -1.86919066090423E-02,  4.07014631272983E-01)
-
-PATH NUMBER =      3838
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.31459723613702E-01,  7.70206929770071E-01)
-X( 2) = (  6.91797949494791E-01,  1.28629808356198E+00)
-X( 3) = ( -5.87094918428964E-02, -4.63989264807837E-01)
-X( 4) = ( -1.27824141018214E-01, -2.22561352116668E-01)
-
-X( 5) = (  1.52290428635069E-02,  3.49156194515566E-01)
-
-PATH NUMBER =      3839
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.22529498626802E-03,  7.14397664412467E-01)
-X( 2) = (  3.52602074356043E-01,  1.06614095776828E+00)
-X( 3) = (  1.49738339774951E-02, -1.30847723358445E-01)
-X( 4) = ( -2.15702684569189E-01, -2.30051970640708E-01)
-
-X( 5) = (  6.02339418636017E-02,  3.20034080651425E-01)
-
-PATH NUMBER =      3840
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.12343360826534E-01,  4.60660263016468E-01)
-X( 2) = (  2.34277231721517E-01,  6.79459909145007E-01)
-X( 3) = ( -1.42720718842813E-01,  1.71716232118795E-01)
-X( 4) = ( -2.78206677749661E-01, -2.92277356288439E-01)
-
-X( 5) = (  1.10134223273516E-01,  3.11333932090382E-01)
-
-PATH NUMBER =      3841
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.14379273991151E-01,  1.27721275672361E-01)
-X( 2) = (  3.92188930494049E-01,  3.07187297824144E-01)
-X( 3) = ( -4.58006116459461E-01,  3.02129564232281E-01)
-X( 4) = ( -2.86089807495980E-01, -3.80121559557158E-01)
-
-X( 5) = (  1.65182127232723E-01,  3.24873070613795E-01)
-
-PATH NUMBER =      3842
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.92981811120297E-03, -1.28633445236865E-01)
-X( 2) = (  7.52448531824930E-01,  1.23513615991942E-01)
-X( 3) = ( -7.83356817320737E-01,  1.99370425503369E-01)
-X( 4) = ( -2.35663469788616E-01, -4.52481301457860E-01)
-
-X( 5) = (  2.19872365192320E-01,  3.75817506304621E-01)
-
-PATH NUMBER =      3843
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.25597545294383E-01, -1.88452676732416E-01)
-X( 2) = (  1.14648656441196E+00,  2.14381820683284E-01)
-X( 3) = ( -9.66537612623377E-01, -8.84790410160646E-02)
-X( 4) = ( -1.50522708467161E-01, -4.75498654566252E-01)
-
-X( 5) = (  2.30363159743851E-01,  4.85527226610959E-01)
-
-PATH NUMBER =      3844
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.47598140108345E-01, -1.55193824850518E-01)
-X( 2) = (  1.33786754362702E+00,  6.60593331578136E-01)
-X( 3) = ( -9.30288465952915E-01, -1.92050067532185E-01)
-X( 4) = (  2.75135781551535E-01, -4.85467426370782E-01)
-
-X( 5) = (  2.17648319514121E-01,  4.15364684745016E-01)
-
-PATH NUMBER =      3845
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.63383112855831E-01,  1.56970161416311E-01)
-X( 2) = (  1.31680381743488E+00,  1.06442413920403E+00)
-X( 3) = ( -6.78621090912032E-01, -4.22432470252666E-01)
-X( 4) = (  3.12587987395145E-01, -4.05617065946040E-01)
-
-X( 5) = (  1.21034997368944E-01,  4.21168395810642E-01)
-
-PATH NUMBER =      3846
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.51424405263047E-01,  4.70526794307862E-01)
-X( 2) = (  1.04109062748238E+00,  1.36023698313597E+00)
-X( 3) = ( -3.37745742789084E-01, -4.37146959210473E-01)
-X( 4) = (  2.89951219254162E-01, -3.20374327189916E-01)
-
-X( 5) = (  7.47491543894550E-02,  3.60820393440381E-01)
-
-PATH NUMBER =      3847
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.41087408950940E-02,  6.38759440500372E-01)
-X( 2) = (  6.39737239559079E-01,  1.40961774610463E+00)
-X( 3) = ( -6.71617853783043E-02, -2.29308461488920E-01)
-X( 4) = (  2.17817472521407E-01, -2.69625234933916E-01)
-
-X( 5) = (  7.86978121940120E-02,  3.06108451754337E-01)
-
-PATH NUMBER =      3848
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.64125687732340E-01,  5.82950175142769E-01)
-X( 2) = (  3.00541364420331E-01,  1.18946062031093E+00)
-X( 3) = (  6.52154044208714E-03,  1.03833079960472E-01)
-X( 4) = (  1.29938928970432E-01, -2.77115853457956E-01)
-
-X( 5) = (  1.03399864508173E-01,  2.70737370902797E-01)
-
-PATH NUMBER =      3849
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.79694343545143E-01,  3.29212773746770E-01)
-X( 2) = (  1.82216521785805E-01,  8.02779571687658E-01)
-X( 3) = ( -1.51173012378221E-01,  4.06397035437712E-01)
-X( 4) = (  6.74349357899598E-02, -3.39341239105687E-01)
-
-X( 5) = (  1.37523999416964E-01,  2.51575226388209E-01)
-
-PATH NUMBER =      3850
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.81730256709759E-01, -3.72621359733690E-03)
-X( 2) = (  3.40128220558337E-01,  4.30506960366794E-01)
-X( 3) = ( -4.66458409994869E-01,  5.36810367551197E-01)
-X( 4) = (  5.95518060436406E-02, -4.27185442374406E-01)
-
-X( 5) = (  1.78765481864679E-01,  2.48594930371767E-01)
-
-PATH NUMBER =      3851
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.69280800829811E-01, -2.60080934506563E-01)
-X( 2) = (  7.00387821889218E-01,  2.46833278534593E-01)
-X( 3) = ( -7.91809110856144E-01,  4.34051228822287E-01)
-X( 4) = (  1.09978143751005E-01, -4.99545184275108E-01)
-
-X( 5) = (  2.24761666051774E-01,  2.69781457132951E-01)
-
-PATH NUMBER =      3852
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.82465625757747E-02, -3.19900166002114E-01)
-X( 2) = (  1.09442585447624E+00,  3.37701483225935E-01)
-X( 3) = ( -9.74989906158784E-01,  1.46201762302853E-01)
-X( 4) = (  1.95118905072460E-01, -5.22562537383500E-01)
-
-X( 5) = (  2.56545161500773E-01,  3.31374063116810E-01)
-
-PATH NUMBER =      3853
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.27288222861324E-01, -4.27738342696553E-01)
-X( 2) = (  1.21871837496279E+00,  7.21597694498080E-01)
-X( 3) = ( -1.08761321105201E+00, -1.77071718010253E-02)
-X( 4) = (  5.70164699652904E-01, -2.99346305699206E-01)
-
-X( 5) = (  3.08598084069587E-01,  3.06753189854290E-01)
-
-PATH NUMBER =      3854
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.43073195608810E-01, -1.15574356429724E-01)
-X( 2) = (  1.19765464877066E+00,  1.12542850212398E+00)
-X( 3) = ( -8.35945836011125E-01, -2.48089574521506E-01)
-X( 4) = (  6.07616905496514E-01, -2.19495945274464E-01)
-
-X( 5) = (  2.38904222019249E-01,  3.61897359962859E-01)
-
-PATH NUMBER =      3855
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.31114488016026E-01,  1.97982276461827E-01)
-X( 2) = (  9.21941458818161E-01,  1.42124134605591E+00)
-X( 3) = ( -4.95070487888176E-01, -2.62804063479312E-01)
-X( 4) = (  5.84980137355532E-01, -1.34253206518341E-01)
-
-X( 5) = (  1.67144828369004E-01,  3.35317482095615E-01)
-
-PATH NUMBER =      3856
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.62011763519278E-02,  3.66214922654338E-01)
-X( 2) = (  5.20588070894856E-01,  1.47062210902457E+00)
-X( 3) = ( -2.24486530477397E-01, -5.49655657577594E-02)
-X( 4) = (  5.12846390622777E-01, -8.35041142623401E-02)
-
-X( 5) = (  1.44907099273046E-01,  2.83688247262466E-01)
-
-PATH NUMBER =      3857
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.84435604979362E-01,  3.10405657296734E-01)
-X( 2) = (  1.81392195756109E-01,  1.25046498323088E+00)
-X( 3) = ( -1.50803204657006E-01,  2.78175975691632E-01)
-X( 4) = (  4.24967847071802E-01, -9.09947327863802E-02)
-
-X( 5) = (  1.52979318740533E-01,  2.41555004765930E-01)
-
-PATH NUMBER =      3858
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.00004260792164E-01,  5.66682559007346E-02)
-X( 2) = (  6.30673531215827E-02,  8.63783934607602E-01)
-X( 3) = ( -3.08497757477314E-01,  5.80739931168873E-01)
-X( 4) = (  3.62463853891330E-01, -1.53220118434111E-01)
-
-X( 5) = (  1.75980093201589E-01,  2.12388282422831E-01)
-
-PATH NUMBER =      3859
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.02040173956781E-01, -2.76270731443372E-01)
-X( 2) = (  2.20979051894115E-01,  4.91511323286739E-01)
-X( 3) = ( -6.23783155093962E-01,  7.11153263282358E-01)
-X( 4) = (  3.54580724145011E-01, -2.41064321702830E-01)
-
-X( 5) = (  2.09372447622722E-01,  1.95884341864116E-01)
-
-PATH NUMBER =      3860
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.89590718076833E-01, -5.32625452352599E-01)
-X( 2) = (  5.81238653224996E-01,  3.07837641454537E-01)
-X( 3) = ( -9.49133855955238E-01,  6.08394124553447E-01)
-X( 4) = (  4.05007061852375E-01, -3.13424063603531E-01)
-
-X( 5) = (  2.52609547055782E-01,  1.96843613758214E-01)
-
-PATH NUMBER =      3861
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.20633546712464E-02, -5.92444683848149E-01)
-X( 2) = (  9.75276685812022E-01,  3.98705846145879E-01)
-X( 3) = ( -1.13231465125788E+00,  3.20544658034013E-01)
-X( 4) = (  4.90147823173830E-01, -3.36441416711924E-01)
-
-X( 5) = (  2.98753832286433E-01,  2.30100318233118E-01)
-
-PATH NUMBER =      3862
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.10313718461563E-01, -7.13853280223848E-01)
-X( 2) = (  1.08823196778356E+00,  6.91742138397104E-01)
-X( 3) = ( -1.32019641101314E+00,  1.47208378243115E-02)
-X( 4) = (  6.76533612655200E-01,  3.28716775931172E-02)
-
-X( 5) = (  4.05838086835469E-01,  2.08972992420341E-01)
-
-PATH NUMBER =      3863
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.26098691209048E-01, -4.01689293957018E-01)
-X( 2) = (  1.06716824159143E+00,  1.09557294602300E+00)
-X( 3) = ( -1.06852903597226E+00, -2.15661564896169E-01)
-X( 4) = (  7.13985818498810E-01,  1.12722038017859E-01)
-
-X( 5) = (  3.75361193513536E-01,  3.08956292250576E-01)
-
-PATH NUMBER =      3864
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.14139983616264E-01, -8.81326610654671E-02)
-X( 2) = (  7.91455051638927E-01,  1.39138578995494E+00)
-X( 3) = ( -7.27653687849308E-01, -2.30376053853976E-01)
-X( 4) = (  6.91349050357828E-01,  1.97964776773982E-01)
-
-X( 5) = (  2.78656626636234E-01,  3.27242492946963E-01)
-
-PATH NUMBER =      3865
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.68243192483102E-02,  8.00999851270433E-02)
-X( 2) = (  3.90101663715622E-01,  1.44076655292360E+00)
-X( 3) = ( -4.57069730438529E-01, -2.25375561324225E-02)
-X( 4) = (  6.19215303625073E-01,  2.48713869029983E-01)
-
-X( 5) = (  2.24028375593377E-01,  2.79543935448584E-01)
-
-PATH NUMBER =      3866
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.01410109379124E-01,  2.42907197694396E-02)
-X( 2) = (  5.09057885768748E-02,  1.22060942712990E+00)
-X( 3) = ( -3.83386404618138E-01,  3.10603985316969E-01)
-X( 4) = (  5.31336760074098E-01,  2.41223250505942E-01)
-
-X( 5) = (  2.13451427536830E-01,  2.27927370420578E-01)
-
-PATH NUMBER =      3867
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.16978765191926E-01, -2.29446681626560E-01)
-X( 2) = ( -6.74190540576517E-02,  8.33928378506625E-01)
-X( 3) = ( -5.41080957438446E-01,  6.13167940794209E-01)
-X( 4) = (  4.68832766893626E-01,  1.78997864858212E-01)
-
-X( 5) = (  2.25836025459111E-01,  1.86653147133019E-01)
-
-PATH NUMBER =      3868
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.19014678356542E-01, -5.62385668970667E-01)
-X( 2) = (  9.04926447148808E-02,  4.61655767185762E-01)
-X( 3) = ( -8.56366355055094E-01,  7.43581272907694E-01)
-X( 4) = (  4.60949637147307E-01,  9.11536615894933E-02)
-
-X( 5) = (  2.52994199916830E-01,  1.55923855939963E-01)
-
-PATH NUMBER =      3869
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.06565222476594E-01, -8.18740389879893E-01)
-X( 2) = (  4.50752246045762E-01,  2.77982085353560E-01)
-X( 3) = ( -1.18171705591637E+00,  6.40822134178784E-01)
-X( 4) = (  5.11375974854671E-01,  1.87939196887917E-02)
-
-X( 5) = (  2.94952828789591E-01,  1.38101253844358E-01)
-
-PATH NUMBER =      3870
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.09621409289923E-02, -8.78559621375444E-01)
-X( 2) = (  8.44790278632788E-01,  3.68850290044902E-01)
-X( 3) = ( -1.36489785121901E+00,  3.52972667659349E-01)
-X( 4) = (  5.96516736176125E-01, -4.22343341960100E-03)
-
-X( 5) = (  3.53011582455602E-01,  1.46074184142677E-01)
-
-PATH NUMBER =      3871
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.57826074792107E-01, -8.79662278350048E-01)
-X( 2) = (  1.00746436220336E+00,  5.84996409782399E-01)
-X( 3) = ( -1.51920980170016E+00, -1.09939464757053E-01)
-X( 4) = (  5.44471324005861E-01,  3.55738036932096E-01)
-
-X( 5) = (  5.39565101214655E-01,  9.79658578716592E-02)
-
-PATH NUMBER =      3872
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.73611047539592E-01, -5.67498292083219E-01)
-X( 2) = (  9.86400636011222E-01,  9.88827217408296E-01)
-X( 3) = ( -1.26754242665927E+00, -3.40321867477533E-01)
-X( 4) = (  5.81923529849471E-01,  4.35588397356838E-01)
-
-X( 5) = (  5.84305868313971E-01,  2.56610957586125E-01)
-
-PATH NUMBER =      3873
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.61652339946809E-01, -2.53941659191667E-01)
-X( 2) = (  7.10687446058723E-01,  1.28464006134023E+00)
-X( 3) = ( -9.26667078536326E-01, -3.55036356435340E-01)
-X( 4) = (  5.59286761708488E-01,  5.20831136112961E-01)
-
-X( 5) = (  4.46684557263688E-01,  3.60750568069154E-01)
-
-PATH NUMBER =      3874
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.74336675578855E-01, -8.57090129991570E-02)
-X( 2) = (  3.09334058135419E-01,  1.33402082430889E+00)
-X( 3) = ( -6.56083121125547E-01, -1.47197858713787E-01)
-X( 4) = (  4.87153014975734E-01,  5.71580228368962E-01)
-
-X( 5) = (  3.32500880134689E-01,  3.13480897102480E-01)
-
-PATH NUMBER =      3875
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.38977530485785E-02, -1.41518278356761E-01)
-X( 2) = ( -2.98618170033285E-02,  1.11386369851520E+00)
-X( 3) = ( -5.82399795305156E-01,  1.85943682735605E-01)
-X( 4) = (  3.99274471424758E-01,  5.64089609844921E-01)
-
-X( 5) = (  2.95004206645988E-01,  2.40624976265658E-01)
-
-PATH NUMBER =      3876
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.69466408861381E-01, -3.95255679752760E-01)
-X( 2) = ( -1.48186659637855E-01,  7.27182649891921E-01)
-X( 3) = ( -7.40094348125463E-01,  4.88507638212845E-01)
-X( 4) = (  3.36770478244286E-01,  5.01864224197191E-01)
-
-X( 5) = (  2.95653682890149E-01,  1.78685804056171E-01)
-
-PATH NUMBER =      3877
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.71502322025998E-01, -7.28194667096867E-01)
-X( 2) = (  9.72503913467733E-03,  3.54910038571058E-01)
-X( 3) = ( -1.05537974574211E+00,  6.18920970326330E-01)
-X( 4) = (  3.28887348497967E-01,  4.14020020928472E-01)
-
-X( 5) = (  3.17657291216560E-01,  1.27521421708351E-01)
-
-PATH NUMBER =      3878
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.90528661460497E-02, -9.84549388006093E-01)
-X( 2) = (  3.69984640465558E-01,  1.71236356738856E-01)
-X( 3) = ( -1.38073044660339E+00,  5.16161831597419E-01)
-X( 4) = (  3.79313686205332E-01,  3.41660279027770E-01)
-
-X( 5) = (  3.60238336961633E-01,  8.56792072397210E-02)
-
-PATH NUMBER =      3879
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.68474497259537E-01, -1.04436861950164E+00)
-X( 2) = (  7.64022673052584E-01,  2.62104561430198E-01)
-X( 3) = ( -1.56391124190603E+00,  2.28312365077985E-01)
-X( 4) = (  4.64454447526786E-01,  3.18642925919378E-01)
-
-X( 5) = (  4.32628448380838E-01,  6.18246657527448E-02)
-
-PATH NUMBER =      3880
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.54011509532466E-01, -8.47581464090154E-01)
-X( 2) = (  1.01420761850511E+00,  4.51308021419414E-01)
-X( 3) = ( -1.59153280582314E+00, -3.33358138522359E-01)
-X( 4) = (  2.35771246272762E-01,  5.18180014523133E-01)
-
-X( 5) = (  8.00910474242343E-01, -6.08407023114342E-02)
-
-PATH NUMBER =      3881
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.69796482279951E-01, -5.35417477823325E-01)
-X( 2) = (  9.93143892312976E-01,  8.55138829045311E-01)
-X( 3) = ( -1.33986543078225E+00, -5.63740541242839E-01)
-X( 4) = (  2.73223452116372E-01,  5.98030374947874E-01)
-
-X( 5) = (  1.07302216302722E+00,  2.55526812233567E-01)
-
-PATH NUMBER =      3882
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.57837774687167E-01, -2.21860844931774E-01)
-X( 2) = (  7.17430702360476E-01,  1.15095167297725E+00)
-X( 3) = ( -9.98990082659306E-01, -5.78455030200646E-01)
-X( 4) = (  2.50586683975390E-01,  6.83273113703998E-01)
-
-X( 5) = (  7.30542463457431E-01,  6.14015697556824E-01)
-
-PATH NUMBER =      3883
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.70522110319214E-01, -5.36281987392637E-02)
-X( 2) = (  3.16077314437172E-01,  1.20033243594591E+00)
-X( 3) = ( -7.28406125248526E-01, -3.70616532479093E-01)
-X( 4) = (  1.78452937242635E-01,  7.34022205959999E-01)
-
-X( 5) = (  4.62142084579432E-01,  4.80653708814329E-01)
-
-PATH NUMBER =      3884
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.42287681691780E-01, -1.09437464096867E-01)
-X( 2) = ( -2.31185607015748E-02,  9.80175310152211E-01)
-X( 3) = ( -6.54722799428135E-01, -3.74749910297014E-02)
-X( 4) = (  9.05743936916597E-02,  7.26531587435959E-01)
-
-X( 5) = (  3.96802463369868E-01,  3.31906212201960E-01)
-
-PATH NUMBER =      3885
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67190258789774E-02, -3.63174865492867E-01)
-X( 2) = ( -1.41443403336102E-01,  5.93494261528935E-01)
-X( 3) = ( -8.12417352248443E-01,  2.65088964447539E-01)
-X( 4) = (  2.80704005111876E-02,  6.64306201788228E-01)
-
-X( 5) = (  3.95639454806747E-01,  2.21440553999413E-01)
-
-PATH NUMBER =      3886
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.46831127143603E-02, -6.96113852836973E-01)
-X( 2) = (  1.64682954364310E-02,  2.21221650208072E-01)
-X( 3) = ( -1.12770274986509E+00,  3.95502296561024E-01)
-X( 4) = (  2.01872707648685E-02,  5.76461998519509E-01)
-
-X( 5) = (  4.22783629689107E-01,  1.30908464727073E-01)
-
-PATH NUMBER =      3887
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.37132568594309E-01, -9.52468573746200E-01)
-X( 2) = (  3.76727896767312E-01,  3.75479683758708E-02)
-X( 3) = ( -1.45305345072637E+00,  2.92743157832113E-01)
-X( 4) = (  7.06136084722331E-02,  5.04102256618807E-01)
-
-X( 5) = (  4.77382394933025E-01,  4.71313442020233E-02)
-
-PATH NUMBER =      3888
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.64659931999895E-01, -1.01228780524175E+00)
-X( 2) = (  7.70765929354338E-01,  1.28416173067213E-01)
-X( 3) = ( -1.63623424602901E+00,  4.89369131267884E-03)
-X( 4) = (  1.55754369793687E-01,  4.81084903510415E-01)
-
-X( 5) = (  5.82128780649532E-01, -3.27569743588495E-02)
-
-PATH NUMBER =      3889
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.05723726909071E+00, -6.97245139626028E-01)
-X( 2) = (  9.24085668249150E-01,  5.90663839939055E-01)
-X( 3) = ( -1.67557459512176E+00, -1.05053247776540E+00)
-X( 4) = ( -5.83881462819782E-02,  7.02189925881532E-01)
-
-X( 5) = (  5.83662237878009E-01, -4.50865223691929E-01)
-
-PATH NUMBER =      3890
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17302224183820E+00, -3.85081153359199E-01)
-X( 2) = (  9.03021942057016E-01,  9.94494647564952E-01)
-X( 3) = ( -1.42390722008087E+00, -1.28091488048588E+00)
-X( 4) = ( -2.09359404383676E-02,  7.82040286306274E-01)
-
-X( 5) = (  9.09773744556831E-01, -6.68820770025582E-01)
-
-PATH NUMBER =      3891
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06106353424541E+00, -7.15245204676478E-02)
-X( 2) = (  6.27308752104517E-01,  1.29030749149689E+00)
-X( 3) = ( -1.08303187195792E+00, -1.29562936944368E+00)
-X( 4) = ( -4.35727085793502E-02,  8.67283025062398E-01)
-
-X( 5) = (  1.56365048066757E+00, -1.48930248424165E-01)
-
-PATH NUMBER =      3892
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.73747869877459E-01,  9.67081257248624E-02)
-X( 2) = (  2.25955364181212E-01,  1.33968825446555E+00)
-X( 3) = ( -8.12447914547145E-01, -1.08779087172213E+00)
-X( 4) = ( -1.15706455312105E-01,  9.18032117318398E-01)
-
-X( 5) = (  9.91184387908656E-01,  3.94287383379287E-01)
-
-PATH NUMBER =      3893
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.45513441250025E-01,  4.08988603672590E-02)
-X( 2) = ( -1.13240510957535E-01,  1.11953112867185E+00)
-X( 3) = ( -7.38764588726754E-01, -7.54649330272739E-01)
-X( 4) = ( -2.03584998863080E-01,  9.10541498794358E-01)
-
-X( 5) = (  6.62738782655011E-01,  2.54970128685187E-01)
-
-PATH NUMBER =      3894
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.29944785437223E-01, -2.12838541028740E-01)
-X( 2) = ( -2.31565353592062E-01,  7.32850080048577E-01)
-X( 3) = ( -8.96459141547061E-01, -4.52085374795498E-01)
-X( 4) = ( -2.66088992043552E-01,  8.48316113146627E-01)
-
-X( 5) = (  5.48520038819608E-01,  1.07014985388574E-01)
-
-PATH NUMBER =      3895
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.27908872272606E-01, -5.45777528372847E-01)
-X( 2) = ( -7.36536548195288E-02,  3.60577468727713E-01)
-X( 3) = ( -1.21174453916371E+00, -3.21672042682013E-01)
-X( 4) = ( -2.73972121789872E-01,  7.60471909877908E-01)
-
-X( 5) = (  5.01966501640144E-01, -1.67200323481447E-02)
-
-PATH NUMBER =      3896
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.40358328152554E-01, -8.02132249282073E-01)
-X( 2) = (  2.86605946511352E-01,  1.76903786895512E-01)
-X( 3) = ( -1.53709524002499E+00, -4.24431181410924E-01)
-X( 4) = ( -2.23545784082507E-01,  6.88112167977207E-01)
-
-X( 5) = (  4.87001745278403E-01, -1.35350273462035E-01)
-
-PATH NUMBER =      3897
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.67885691558140E-01, -8.61951480777624E-01)
-X( 2) = (  6.80643979098378E-01,  2.67771991586854E-01)
-X( 3) = ( -1.72027603532763E+00, -7.12280647930359E-01)
-X( 4) = ( -1.38405022761053E-01,  6.65094814868814E-01)
-
-X( 5) = (  5.02208130506635E-01, -2.70272211441220E-01)
-
-PATH NUMBER =      3898
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07707589547877E+00, -3.99988652230131E-01)
-X( 2) = (  1.05691398376507E+00,  5.74089906011109E-01)
-X( 3) = ( -1.46810891089933E+00, -1.16055297850295E+00)
-X( 4) = ( -2.71967471172258E-01,  4.26387449359801E-01)
-
-X( 5) = (  1.26558278136858E+00, -8.03010971475371E-01)
-
-PATH NUMBER =      3899
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19286086822626E+00, -8.78246659633011E-02)
-X( 2) = (  1.03585025757293E+00,  9.77920713637007E-01)
-X( 3) = ( -1.21644153585845E+00, -1.39093538122343E+00)
-X( 4) = ( -2.34515265328648E-01,  5.06237809784543E-01)
-
-X( 5) = (  4.59326107350119E+00, -1.19683700426160E+00)
-
-PATH NUMBER =      3900
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08090216063348E+00,  2.25731966928250E-01)
-X( 2) = (  7.60137067620432E-01,  1.27373355756894E+00)
-X( 3) = ( -8.75566187735499E-01, -1.40564987018124E+00)
-X( 4) = ( -2.57152033469630E-01,  5.91480548540666E-01)
-
-X( 5) = (  6.73076976015459E-01,  2.22943450594469E+00)
-
-PATH NUMBER =      3901
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.93586496265522E-01,  3.93964613120760E-01)
-X( 2) = (  3.58783679697127E-01,  1.32311432053760E+00)
-X( 3) = ( -6.04982230324720E-01, -1.19781137245968E+00)
-X( 4) = ( -3.29285780202386E-01,  6.42229640796667E-01)
-
-X( 5) = (  4.51940054426463E-01,  1.02290371925908E+00)
-
-PATH NUMBER =      3902
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.65352067638088E-01,  3.38155347763156E-01)
-X( 2) = (  1.95878045583808E-02,  1.10295719474391E+00)
-X( 3) = ( -5.31298904504329E-01, -8.64669831010291E-01)
-X( 4) = ( -4.17164323753360E-01,  6.34739022272627E-01)
-
-X( 5) = (  5.02223129611070E-01,  6.09837161703845E-01)
-
-PATH NUMBER =      3903
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.49783411825286E-01,  8.44179463671572E-02)
-X( 2) = ( -9.87370380761463E-02,  7.16276146120631E-01)
-X( 3) = ( -6.88993457324636E-01, -5.62105875533051E-01)
-X( 4) = ( -4.79668316933833E-01,  5.72513636624896E-01)
-
-X( 5) = (  5.62364598593313E-01,  3.67256309656346E-01)
-
-PATH NUMBER =      3904
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.47747498660669E-01, -2.48521040976950E-01)
-X( 2) = (  5.91746606963866E-02,  3.44003534799768E-01)
-X( 3) = ( -1.00427885494128E+00, -4.31692543419566E-01)
-X( 4) = ( -4.87551446680152E-01,  4.84669433356177E-01)
-
-X( 5) = (  6.28466167761304E-01,  1.72012671880763E-01)
-
-PATH NUMBER =      3905
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.60196954540617E-01, -5.04875761886175E-01)
-X( 2) = (  4.19434262027268E-01,  1.60329852967567E-01)
-X( 3) = ( -1.32962955580256E+00, -5.34451682148477E-01)
-X( 4) = ( -4.37125108972787E-01,  4.12309691455476E-01)
-
-X( 5) = (  7.14843668973693E-01, -2.98566654361382E-02)
-
-PATH NUMBER =      3906
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.87724317946203E-01, -5.64694993381727E-01)
-X( 2) = (  8.13472294614294E-01,  2.51198057658908E-01)
-X( 3) = ( -1.51281035110520E+00, -8.22301148667910E-01)
-X( 4) = ( -3.51984347651333E-01,  3.89292338347083E-01)
-
-X( 5) = (  8.62592481823991E-01, -2.99805857237324E-01)
-
-PATH NUMBER =      3907
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.01200377985437E-01, -1.59524948643989E-01)
-X( 2) = (  1.16931989612753E+00,  6.46773931454150E-01)
-X( 3) = ( -1.23846116167726E+00, -1.11147720046880E+00)
-X( 4) = ( -2.58296311540530E-01,  7.78243510971884E-02)
-
-X( 5) = (  1.41526961041351E+00,  9.85166422824396E-01)
-
-PATH NUMBER =      3908
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01698535073292E+00,  1.52639037622840E-01)
-X( 2) = (  1.14825616993540E+00,  1.05060473908005E+00)
-X( 3) = ( -9.86793786636374E-01, -1.34185960318928E+00)
-X( 4) = ( -2.20844105696919E-01,  1.57674711521930E-01)
-
-X( 5) = (  2.78909661294074E-01,  1.52212165852591E+00)
-
-PATH NUMBER =      3909
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.05026643140139E-01,  4.66195670514391E-01)
-X( 2) = (  8.72542979982900E-01,  1.34641758301198E+00)
-X( 3) = ( -6.45918438513426E-01, -1.35657409214709E+00)
-X( 4) = ( -2.43480873837902E-01,  2.42917450278054E-01)
-
-X( 5) = (  3.03136467116461E-02,  9.08217537638443E-01)
-
-PATH NUMBER =      3910
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.17710978772185E-01,  6.34428316706902E-01)
-X( 2) = (  4.71189592059596E-01,  1.39579834598064E+00)
-X( 3) = ( -3.75334481102647E-01, -1.14873559442554E+00)
-X( 4) = ( -3.15614620570657E-01,  2.93666542534054E-01)
-
-X( 5) = (  1.16828422626828E-01,  6.42457911710028E-01)
-
-PATH NUMBER =      3911
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.89476550144751E-01,  5.78619051349298E-01)
-X( 2) = (  1.31993716920849E-01,  1.17564122018695E+00)
-X( 3) = ( -3.01651155282256E-01, -8.15594052976146E-01)
-X( 4) = ( -4.03493164121632E-01,  2.86175924010014E-01)
-
-X( 5) = (  2.18046992386378E-01,  5.06405429152144E-01)
-
-PATH NUMBER =      3912
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.39078943319487E-02,  3.24881649953299E-01)
-X( 2) = (  1.36688742863218E-02,  7.88960171563672E-01)
-X( 3) = ( -4.59345708102563E-01, -5.13030097498905E-01)
-X( 4) = ( -4.65997157302104E-01,  2.23950538362283E-01)
-
-X( 5) = (  3.21795928690756E-01,  4.17200823724639E-01)
-
-PATH NUMBER =      3913
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.18719811673321E-02, -8.05733739080786E-03)
-X( 2) = (  1.71580573058855E-01,  4.16687560242809E-01)
-X( 3) = ( -7.74631105719212E-01, -3.82616765385420E-01)
-X( 4) = ( -4.73880287048423E-01,  1.36106335093564E-01)
-
-X( 5) = (  4.44049872521483E-01,  3.48737770444135E-01)
-
-PATH NUMBER =      3914
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.84321437047280E-01, -2.64412058300034E-01)
-X( 2) = (  5.31840174389736E-01,  2.33013878410607E-01)
-X( 3) = ( -1.09998180658049E+00, -4.85375904114331E-01)
-X( 4) = ( -4.23453949341059E-01,  6.37465931928628E-02)
-
-X( 5) = (  6.20085708800954E-01,  2.98623883167599E-01)
-
-PATH NUMBER =      3915
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.11848800452866E-01, -3.24231289795585E-01)
-X( 2) = (  9.25878206976762E-01,  3.23882083101949E-01)
-X( 3) = ( -1.28316260188313E+00, -7.73225370633765E-01)
-X( 4) = ( -3.38313188019604E-01,  4.07292400844701E-02)
-
-X( 5) = (  9.42123451852117E-01,  3.27577079597587E-01)
-
-PATH NUMBER =      3916
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.11904825884483E-01, -8.83696682319412E-02)
-X( 2) = (  1.20870742968959E+00,  7.74706252970416E-01)
-X( 3) = ( -1.09408608156698E+00, -9.26268245621655E-01)
-X( 4) = ( -2.37715549164918E-02, -1.80402821381898E-01)
-
-X( 5) = (  5.44980276283751E-01,  5.85532621896198E-01)
-
-PATH NUMBER =      3917
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.27689798631968E-01,  2.23794318034888E-01)
-X( 2) = (  1.18764370349746E+00,  1.17853706059631E+00)
-X( 3) = ( -8.42418706526101E-01, -1.15665064834214E+00)
-X( 4) = (  1.36806509271185E-02, -1.00552460957157E-01)
-
-X( 5) = (  2.84647655854226E-01,  7.05151026261193E-01)
-
-PATH NUMBER =      3918
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.15731091039185E-01,  5.37350950926439E-01)
-X( 2) = (  9.11930513544960E-01,  1.47434990452825E+00)
-X( 3) = ( -5.01543358403152E-01, -1.17136513729994E+00)
-X( 4) = ( -8.95611721386400E-03, -1.53097222010330E-02)
-
-X( 5) = (  1.37277347798109E-01,  5.60322882057994E-01)
-
-PATH NUMBER =      3919
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.28415426671231E-01,  7.05583597118949E-01)
-X( 2) = (  5.10577125621656E-01,  1.52373066749691E+00)
-X( 3) = ( -2.30959400992373E-01, -9.63526639578389E-01)
-X( 4) = ( -8.10898639466192E-02,  3.54393700549677E-02)
-
-X( 5) = (  1.35582903073997E-01,  4.36214275384673E-01)
-
-PATH NUMBER =      3920
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.80998043797574E-04,  6.49774331761346E-01)
-X( 2) = (  1.71381250482909E-01,  1.30357354170321E+00)
-X( 3) = ( -1.57276075171982E-01, -6.30385098128998E-01)
-X( 4) = ( -1.68968407497594E-01,  2.79487515309274E-02)
-
-X( 5) = (  1.74729353376662E-01,  3.59616035018845E-01)
-
-PATH NUMBER =      3921
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.15387657769005E-01,  3.96036930365347E-01)
-X( 2) = (  5.30564078483818E-02,  9.16892493079937E-01)
-X( 3) = ( -3.14970627992289E-01, -3.27821142651757E-01)
-X( 4) = ( -2.31472400678066E-01, -3.42766341168034E-02)
-
-X( 5) = (  2.28751897285279E-01,  3.10969608864099E-01)
-
-PATH NUMBER =      3922
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.17423570933622E-01,  6.30979430212400E-02)
-X( 2) = (  2.10968106620915E-01,  5.44619881759074E-01)
-X( 3) = ( -6.30256025608938E-01, -1.97407810538272E-01)
-X( 4) = ( -2.39355530424386E-01, -1.22120837385522E-01)
-
-X( 5) = (  2.97610624124034E-01,  2.82306248408855E-01)
-
-PATH NUMBER =      3923
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.97411505367372E-03, -1.93256777887986E-01)
-X( 2) = (  5.71227707951796E-01,  3.60946199926873E-01)
-X( 3) = ( -9.55606726470213E-01, -3.00166949267183E-01)
-X( 4) = ( -1.88929192717021E-01, -1.94480579286224E-01)
-
-X( 5) = (  3.90638816277808E-01,  2.81523049095033E-01)
-
-PATH NUMBER =      3924
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.22553248351912E-01, -2.53076009383537E-01)
-X( 2) = (  9.65265740538822E-01,  4.51814404618215E-01)
-X( 3) = ( -1.13878752177285E+00, -5.88016415786617E-01)
-X( 4) = ( -1.03788431395566E-01, -2.17497932394617E-01)
-
-X( 5) = (  5.12036630084770E-01,  3.53448919076435E-01)
-
-PATH NUMBER =      3925
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.44553843165875E-01, -2.19817157501639E-01)
-X( 2) = (  1.15664671975388E+00,  8.98025915513066E-01)
-X( 3) = ( -1.10253837510239E+00, -6.91587442302738E-01)
-X( 4) = (  3.21870058623129E-01, -2.27466704199146E-01)
-
-X( 5) = (  4.26609266391375E-01,  3.15632055937619E-01)
-
-PATH NUMBER =      3926
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.60338815913360E-01,  9.23468287651901E-02)
-X( 2) = (  1.13558299356175E+00,  1.30185672313896E+00)
-X( 3) = ( -8.50871000061508E-01, -9.21969845023219E-01)
-X( 4) = (  3.59322264466739E-01, -1.47616343774404E-01)
-
-X( 5) = (  3.43267783298213E-01,  4.23409229438620E-01)
-
-PATH NUMBER =      3927
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.48380108320577E-01,  4.05903461656741E-01)
-X( 2) = (  8.59869803609249E-01,  1.59766956707090E+00)
-X( 3) = ( -5.09995651938560E-01, -9.36684333981026E-01)
-X( 4) = (  3.36685496325757E-01, -6.23736050182807E-02)
-
-X( 5) = (  2.27574548561893E-01,  3.99736140119015E-01)
-
-PATH NUMBER =      3928
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.10644439526232E-02,  5.74136107849252E-01)
-X( 2) = (  4.58516415685944E-01,  1.64705033003956E+00)
-X( 3) = ( -2.39411694527781E-01, -7.28845836259473E-01)
-X( 4) = (  2.64551749593001E-01, -1.16245127622802E-02)
-
-X( 5) = (  1.87660703931932E-01,  3.28210108503921E-01)
-
-PATH NUMBER =      3929
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.67169984674810E-01,  5.18326842491649E-01)
-X( 2) = (  1.19320540547197E-01,  1.42689320424586E+00)
-X( 3) = ( -1.65728368707389E-01, -3.95704294810081E-01)
-X( 4) = (  1.76673206042026E-01, -1.91151312863205E-02)
-
-X( 5) = (  1.92715931608867E-01,  2.69438179173041E-01)
-
-PATH NUMBER =      3930
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.82738640487613E-01,  2.64589441095649E-01)
-X( 2) = (  9.95697912670080E-04,  1.04021215562259E+00)
-X( 3) = ( -3.23422921527697E-01, -9.31403393328406E-02)
-X( 4) = (  1.14169212861554E-01, -8.13405169340514E-02)
-
-X( 5) = (  2.17929370333728E-01,  2.27273026553468E-01)
-
-PATH NUMBER =      3931
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.84774553652230E-01, -6.83495462484581E-02)
-X( 2) = (  1.58907396685203E-01,  6.67939544301725E-01)
-X( 3) = ( -6.38708319144346E-01,  3.72729927806446E-02)
-X( 4) = (  1.06286083115235E-01, -1.69184720202770E-01)
-
-X( 5) = (  2.57041031767184E-01,  1.99074860150563E-01)
-
-PATH NUMBER =      3932
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.72325097772282E-01, -3.24704267157684E-01)
-X( 2) = (  5.19166998016084E-01,  4.84265862469523E-01)
-X( 3) = ( -9.64059020005621E-01, -6.54861459482660E-02)
-X( 4) = (  1.56712420822600E-01, -2.41544462103472E-01)
-
-X( 5) = (  3.11854274700619E-01,  1.88589110834179E-01)
-
-PATH NUMBER =      3933
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.52022656333040E-02, -3.84523498653235E-01)
-X( 2) = (  9.13205030603110E-01,  5.75134067160865E-01)
-X( 3) = ( -1.14723981530826E+00, -3.53335612467700E-01)
-X( 4) = (  2.41853182144055E-01, -2.64561815211864E-01)
-
-X( 5) = (  3.82252670041984E-01,  2.15341587263100E-01)
-
-PATH NUMBER =      3934
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.24243925918854E-01, -4.92361675347674E-01)
-X( 2) = (  1.03749755108966E+00,  9.59030278433010E-01)
-X( 3) = ( -1.25986312020148E+00, -5.17244546571578E-01)
-X( 4) = (  6.16898976724498E-01, -4.13455835275699E-02)
-
-X( 5) = (  4.01294611437425E-01,  1.58669949221883E-01)
-
-PATH NUMBER =      3935
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.40028898666339E-01, -1.80197689080845E-01)
-X( 2) = (  1.01643382489753E+00,  1.36286108605891E+00)
-X( 3) = ( -1.00819574516060E+00, -7.47626949292059E-01)
-X( 4) = (  6.54351182568109E-01,  3.85047768971716E-02)
-
-X( 5) = (  3.93650683873411E-01,  2.53528978159231E-01)
-
-PATH NUMBER =      3936
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.28070191073556E-01,  1.33358943810706E-01)
-X( 2) = (  7.40720634945027E-01,  1.65867392999084E+00)
-X( 3) = ( -6.67320397037653E-01, -7.62341438249866E-01)
-X( 4) = (  6.31714414427126E-01,  1.23747515653295E-01)
-
-X( 5) = (  3.08024544518484E-01,  2.90938977023122E-01)
-
-PATH NUMBER =      3937
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.92454732943984E-02,  3.01591590003217E-01)
-X( 2) = (  3.39367247021722E-01,  1.70805469295950E+00)
-X( 3) = ( -3.96736439626873E-01, -5.54502940528312E-01)
-X( 4) = (  5.59580667694371E-01,  1.74496607909296E-01)
-
-X( 5) = (  2.46439966035975E-01,  2.55830026985232E-01)
-
-PATH NUMBER =      3938
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.87479901921832E-01,  2.45782324645613E-01)
-X( 2) = (  1.71371882974687E-04,  1.48789756716581E+00)
-X( 3) = ( -3.23053113806482E-01, -2.21361399078921E-01)
-X( 4) = (  4.71702124143396E-01,  1.67005989385256E-01)
-
-X( 5) = (  2.27706505971428E-01,  2.07778567414366E-01)
-
-PATH NUMBER =      3939
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.03048557734635E-01, -7.95507675038635E-03)
-X( 2) = ( -1.18153470751552E-01,  1.10121651854253E+00)
-X( 3) = ( -4.80747666626790E-01,  8.12025563983197E-02)
-X( 4) = (  4.09198130962924E-01,  1.04780603737525E-01)
-
-X( 5) = (  2.33588384667761E-01,  1.66544095425128E-01)
-
-PATH NUMBER =      3940
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.05084470899251E-01, -3.40894064094493E-01)
-X( 2) = (  3.97582280209807E-02,  7.28943907221669E-01)
-X( 3) = ( -7.96033064243439E-01,  2.11615888511805E-01)
-X( 4) = (  4.01315001216605E-01,  1.69364004688059E-02)
-
-X( 5) = (  2.55058277655411E-01,  1.34064316187391E-01)
-
-PATH NUMBER =      3941
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.92635015019303E-01, -5.97248785003719E-01)
-X( 2) = (  4.00017829351862E-01,  5.45270225389467E-01)
-X( 3) = ( -1.12138376510471E+00,  1.08856749782894E-01)
-X( 4) = (  4.51741338923970E-01, -5.54233414318956E-02)
-
-X( 5) = (  2.91404569361078E-01,  1.12265863527576E-01)
-
-PATH NUMBER =      3942
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.51076516137169E-02, -6.57068016499270E-01)
-X( 2) = (  7.94055861938888E-01,  6.36138430080809E-01)
-X( 3) = ( -1.30456456040735E+00, -1.78992716736540E-01)
-X( 4) = (  5.36882100245424E-01, -7.84406945402881E-02)
-
-X( 5) = (  3.44688472797196E-01,  1.11574070727842E-01)
-
-PATH NUMBER =      3943
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.07269421519092E-01, -7.78476612874968E-01)
-X( 2) = (  9.07011143910425E-01,  9.29174722332034E-01)
-X( 3) = ( -1.49244632016262E+00, -4.84816536946242E-01)
-X( 4) = (  7.23267889726794E-01,  2.90872399764752E-01)
-
-X( 5) = (  4.00800575199065E-01,  3.80517207449835E-02)
-
-PATH NUMBER =      3944
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.23054394266577E-01, -4.66312626608139E-01)
-X( 2) = (  8.85947417718292E-01,  1.33300552995793E+00)
-X( 3) = ( -1.24077894512173E+00, -7.15198939666721E-01)
-X( 4) = (  7.60720095570405E-01,  3.70722760189494E-01)
-
-X( 5) = (  4.44295227449992E-01,  1.13338927362779E-01)
-
-PATH NUMBER =      3945
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.11095686673794E-01, -1.52755993716588E-01)
-X( 2) = (  6.10234227765792E-01,  1.62881837388987E+00)
-X( 3) = ( -8.99903596998785E-01, -7.29913428624529E-01)
-X( 4) = (  7.38083327429423E-01,  4.55965498945617E-01)
-
-X( 5) = (  3.95495461130097E-01,  1.95130457439220E-01)
-
-PATH NUMBER =      3946
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.37800223058395E-02,  1.54766524759222E-02)
-X( 2) = (  2.08880839842487E-01,  1.67819913685853E+00)
-X( 3) = ( -6.29319639588005E-01, -5.22074930902975E-01)
-X( 4) = (  6.65949580696667E-01,  5.06714591201618E-01)
-
-X( 5) = (  3.17817690855802E-01,  1.97366088365322E-01)
-
-PATH NUMBER =      3947
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.04454406321594E-01, -4.03326128816813E-02)
-X( 2) = ( -1.30315035296259E-01,  1.45804201106483E+00)
-X( 3) = ( -5.55636313767614E-01, -1.88933389453584E-01)
-X( 4) = (  5.78071037145692E-01,  4.99223972677578E-01)
-
-X( 5) = (  2.76133088661660E-01,  1.59664535339528E-01)
-
-PATH NUMBER =      3948
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.20023062134396E-01, -2.94070014277680E-01)
-X( 2) = ( -2.48639877930786E-01,  1.07136096244156E+00)
-X( 3) = ( -7.13330866587922E-01,  1.13630566023657E-01)
-X( 4) = (  5.15567043965221E-01,  4.36998587029847E-01)
-
-X( 5) = (  2.64370360898379E-01,  1.17803320817960E-01)
-
-PATH NUMBER =      3949
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.22058975299013E-01, -6.27009001621787E-01)
-X( 2) = ( -9.07281791582535E-02,  6.99088351120692E-01)
-X( 3) = ( -1.02861626420457E+00,  2.44043898137142E-01)
-X( 4) = (  5.07683914218901E-01,  3.49154383761128E-01)
-
-X( 5) = (  2.71509583456659E-01,  7.98881684385848E-02)
-
-PATH NUMBER =      3950
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.09609519419065E-01, -8.83363722531014E-01)
-X( 2) = (  2.69531422172628E-01,  5.15414669288491E-01)
-X( 3) = ( -1.35396696506585E+00,  1.41284759408231E-01)
-X( 4) = (  5.58110251926266E-01,  2.76794641860427E-01)
-
-X( 5) = (  2.94806310262412E-01,  4.76098604559427E-02)
-
-PATH NUMBER =      3951
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.79178439865211E-02, -9.43182954026565E-01)
-X( 2) = (  6.63569454759653E-01,  6.06282873979833E-01)
-X( 3) = ( -1.53714776036849E+00, -1.46564707111203E-01)
-X( 4) = (  6.43251013247720E-01,  2.53777288752034E-01)
-
-X( 5) = (  3.37597261733626E-01,  2.66872772118905E-02)
-
-PATH NUMBER =      3952
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.54781777849637E-01, -9.44285611001169E-01)
-X( 2) = (  8.26243538330222E-01,  8.22428993717330E-01)
-X( 3) = ( -1.69145971084963E+00, -6.09476839527606E-01)
-X( 4) = (  5.91205601077456E-01,  6.13738759103731E-01)
-
-X( 5) = (  4.16034744805003E-01, -7.93497901128505E-02)
-
-PATH NUMBER =      3953
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.70566750597121E-01, -6.32121624734340E-01)
-X( 2) = (  8.05179812138088E-01,  1.22625980134323E+00)
-X( 3) = ( -1.43979233580875E+00, -8.39859242248085E-01)
-X( 4) = (  6.28657806921066E-01,  6.93589119528473E-01)
-
-X( 5) = (  5.07739153132442E-01, -3.57599588875453E-02)
-
-PATH NUMBER =      3954
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.58608043004338E-01, -3.18564991842789E-01)
-X( 2) = (  5.29466622185588E-01,  1.52207264527516E+00)
-X( 3) = ( -1.09891698768580E+00, -8.54573731205893E-01)
-X( 4) = (  6.06021038780083E-01,  7.78831858284597E-01)
-
-X( 5) = (  5.16363982016373E-01,  8.95846696327466E-02)
-
-PATH NUMBER =      3955
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.71292378636385E-01, -1.50332345650278E-01)
-X( 2) = (  1.28113234262284E-01,  1.57145340824382E+00)
-X( 3) = ( -8.28333030275023E-01, -6.46735233484340E-01)
-X( 4) = (  5.33887292047328E-01,  8.29580950540597E-01)
-
-X( 5) = (  4.21746316531758E-01,  1.46013129937763E-01)
-
-PATH NUMBER =      3956
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.69420499910490E-02, -2.06141611007882E-01)
-X( 2) = ( -2.11082640876463E-01,  1.35129628245013E+00)
-X( 3) = ( -7.54649704454632E-01, -3.13593692034948E-01)
-X( 4) = (  4.46008748496353E-01,  8.22090332016557E-01)
-
-X( 5) = (  3.48253588720050E-01,  1.21342344663371E-01)
-
-PATH NUMBER =      3957
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.72510705803852E-01, -4.59879012403881E-01)
-X( 2) = ( -3.29407483510990E-01,  9.64615233826851E-01)
-X( 3) = ( -9.12344257274939E-01, -1.10297365577077E-02)
-X( 4) = (  3.83504755315881E-01,  7.59864946368826E-01)
-
-X( 5) = (  3.14507516842706E-01,  7.63799216588183E-02)
-
-PATH NUMBER =      3958
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.74546618968468E-01, -7.92817999747988E-01)
-X( 2) = ( -1.71495784738457E-01,  5.92342622505988E-01)
-X( 3) = ( -1.22762965489159E+00,  1.19383595555777E-01)
-X( 4) = (  3.75621625569562E-01,  6.72020743100107E-01)
-
-X( 5) = (  3.06006950837884E-01,  3.02819542572927E-02)
-
-PATH NUMBER =      3959
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.20971630885202E-02, -1.04917272065721E+00)
-X( 2) = (  1.88763816592424E-01,  4.08668940673786E-01)
-X( 3) = ( -1.55298035575286E+00,  1.66244568268666E-02)
-X( 4) = (  4.26047963276927E-01,  5.99661001199406E-01)
-
-X( 5) = (  3.16565469534353E-01, -1.43835453165810E-02)
-
-PATH NUMBER =      3960
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.65430200317066E-01, -1.10899195215276E+00)
-X( 2) = (  5.82801849179449E-01,  4.99537145365128E-01)
-X( 3) = ( -1.73616115105550E+00, -2.71225009692567E-01)
-X( 4) = (  5.11188724598381E-01,  5.76643648091013E-01)
-
-X( 5) = (  3.49521704233924E-01, -5.56685454146991E-02)
-
-PATH NUMBER =      3961
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.50967212589995E-01, -9.12204796741276E-01)
-X( 2) = (  8.32986794631976E-01,  6.88740605354344E-01)
-X( 3) = ( -1.76378271497261E+00, -8.32895513292912E-01)
-X( 4) = (  2.82505523344356E-01,  7.76180736694768E-01)
-
-X( 5) = (  4.57135650360127E-01, -2.23177850689554E-01)
-
-PATH NUMBER =      3962
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.66752185337480E-01, -6.00040810474446E-01)
-X( 2) = (  8.11923068439841E-01,  1.09257141298024E+00)
-X( 3) = ( -1.51211533993173E+00, -1.06327791601339E+00)
-X( 4) = (  3.19957729187966E-01,  8.56031097119510E-01)
-
-X( 5) = (  6.14107027167083E-01, -2.43586697784228E-01)
-
-PATH NUMBER =      3963
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.54793477744697E-01, -2.86484177582895E-01)
-X( 2) = (  5.36209878487342E-01,  1.38838425691218E+00)
-X( 3) = ( -1.17123999180878E+00, -1.07799240497120E+00)
-X( 4) = (  2.97320961046984E-01,  9.41273835875634E-01)
-
-X( 5) = (  7.49686197443617E-01, -5.30369415854869E-02)
-
-PATH NUMBER =      3964
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.67477813376743E-01, -1.18251531390385E-01)
-X( 2) = (  1.34856490564037E-01,  1.43776501988084E+00)
-X( 3) = ( -9.00656034398003E-01, -8.70153907249646E-01)
-X( 4) = (  2.25187214314229E-01,  9.92022928131635E-01)
-
-X( 5) = (  6.14577803615357E-01,  1.22940676354992E-01)
-
-PATH NUMBER =      3965
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.39243384749310E-01, -1.74060796747988E-01)
-X( 2) = ( -2.04339384574709E-01,  1.21760789408714E+00)
-X( 3) = ( -8.26972708577612E-01, -5.37012365800255E-01)
-X( 4) = (  1.37308670763254E-01,  9.84532309607594E-01)
-
-X( 5) = (  4.71956639560217E-01,  1.10977889114588E-01)
-
-PATH NUMBER =      3966
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.36747289365071E-02, -4.27798198143988E-01)
-X( 2) = ( -3.22664227209237E-01,  8.30926845463866E-01)
-X( 3) = ( -9.84667261397919E-01, -2.34448410323014E-01)
-X( 4) = (  7.48046775827817E-02,  9.22306923959864E-01)
-
-X( 5) = (  4.01814323733523E-01,  5.07011979377123E-02)
-
-PATH NUMBER =      3967
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.16388157718904E-02, -7.60737185488094E-01)
-X( 2) = ( -1.64752528436703E-01,  4.58654234143002E-01)
-X( 3) = ( -1.29995265901457E+00, -1.04035078209529E-01)
-X( 4) = (  6.69215478364627E-02,  8.34462720691144E-01)
-
-X( 5) = (  3.72143037009187E-01, -1.38426891016254E-02)
-
-PATH NUMBER =      3968
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.34088271651839E-01, -1.01709190639732E+00)
-X( 2) = (  1.95507072894178E-01,  2.74980552310801E-01)
-X( 3) = ( -1.62530335987584E+00, -2.06794216938439E-01)
-X( 4) = (  1.17347885543827E-01,  7.62102978790443E-01)
-
-X( 5) = (  3.67421097351048E-01, -7.96148710305899E-02)
-
-PATH NUMBER =      3969
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.61615635057425E-01, -1.07691113789287E+00)
-X( 2) = (  5.89545105481203E-01,  3.65848757002143E-01)
-X( 3) = ( -1.80848415517848E+00, -4.94643683457874E-01)
-X( 4) = (  2.02488646865281E-01,  7.39085625682050E-01)
-
-X( 5) = (  3.88880102135806E-01, -1.50247359205152E-01)
-
-PATH NUMBER =      3970
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09644427985952E+00, -7.48706320854075E-01)
-X( 2) = (  6.32643740054460E-01,  6.56061251274952E-01)
-X( 3) = ( -1.48642924577561E+00, -1.54392041520954E+00)
-X( 4) = ( -1.88427280530207E-01,  9.29870159671076E-01)
-
-X( 5) = (  2.42786181272591E-01, -4.34063801266432E-01)
-
-PATH NUMBER =      3971
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21222925260701E+00, -4.36542334587246E-01)
-X( 2) = (  6.11580013862326E-01,  1.05989205890085E+00)
-X( 3) = ( -1.23476187073473E+00, -1.77430281793002E+00)
-X( 4) = ( -1.50975074686597E-01,  1.00972052009582E+00)
-
-X( 5) = (  2.49731101545454E-01, -5.82326976937237E-01)
-
-PATH NUMBER =      3972
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10027054501422E+00, -1.22985701695694E-01)
-X( 2) = (  3.35866823909825E-01,  1.35570490283278E+00)
-X( 3) = ( -8.93886522611776E-01, -1.78901730688782E+00)
-X( 4) = ( -1.73611842827580E-01,  1.09496325885194E+00)
-
-X( 5) = (  4.28058753854384E-01, -7.78547905249485E-01)
-
-PATH NUMBER =      3973
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.12954880646267E-01,  4.52469444968150E-02)
-X( 2) = ( -6.54865640134776E-02,  1.40508566580145E+00)
-X( 3) = ( -6.23302565200998E-01, -1.58117880916627E+00)
-X( 4) = ( -2.45745589560334E-01,  1.14571235110794E+00)
-
-X( 5) = (  8.26292595325532E-01, -6.14160516151402E-01)
-
-PATH NUMBER =      3974
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.84720452018834E-01, -1.05623208607880E-02)
-X( 2) = ( -4.04682439152225E-01,  1.18492854000775E+00)
-X( 3) = ( -5.49619239380606E-01, -1.24803726771688E+00)
-X( 4) = ( -3.33624133111309E-01,  1.13822173258390E+00)
-
-X( 5) = (  7.31376392807497E-01, -2.51356603339505E-01)
-
-PATH NUMBER =      3975
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.69151796206031E-01, -2.64299722256788E-01)
-X( 2) = ( -5.23007281786752E-01,  7.98247491384473E-01)
-X( 3) = ( -7.07313792200914E-01, -9.45473312239639E-01)
-X( 4) = ( -3.96128126291781E-01,  1.07599634693617E+00)
-
-X( 5) = (  5.35014534730588E-01, -1.87456829227439E-01)
-
-PATH NUMBER =      3976
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67115883041414E-01, -5.97238709600894E-01)
-X( 2) = ( -3.65095583014219E-01,  4.25974880063610E-01)
-X( 3) = ( -1.02259918981756E+00, -8.15059980126153E-01)
-X( 4) = ( -4.04011256038100E-01,  9.88152143667452E-01)
-
-X( 5) = (  4.13732175388912E-01, -2.16232793627866E-01)
-
-PATH NUMBER =      3977
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.79565338921363E-01, -8.53593430510121E-01)
-X( 2) = ( -4.83598168333753E-03,  2.42301198231409E-01)
-X( 3) = ( -1.34794989067884E+00, -9.17819118855065E-01)
-X( 4) = ( -3.53584918330736E-01,  9.15792401766751E-01)
-
-X( 5) = (  3.35302026774125E-01, -2.68976300492418E-01)
-
-PATH NUMBER =      3978
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.07092702326949E-01, -9.13412662005672E-01)
-X( 2) = (  3.89202050903688E-01,  3.33169402922750E-01)
-X( 3) = ( -1.53113068598148E+00, -1.20566858537450E+00)
-X( 4) = ( -2.68444157009281E-01,  8.92775048658358E-01)
-
-X( 5) = (  2.79524613507767E-01, -3.38093633526544E-01)
-
-PATH NUMBER =      3979
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11628290624758E+00, -4.51449833458177E-01)
-X( 2) = (  7.65472055570375E-01,  6.39487317347006E-01)
-X( 3) = ( -1.27896356155318E+00, -1.65394091594709E+00)
-X( 4) = ( -4.02006605420487E-01,  6.54067683149345E-01)
-
-X( 5) = (  2.52369073660620E-01, -6.86411446111537E-01)
-
-PATH NUMBER =      3980
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23206787899507E+00, -1.39285847191348E-01)
-X( 2) = (  7.44408329378241E-01,  1.04331812497290E+00)
-X( 3) = ( -1.02729618651230E+00, -1.88432331866757E+00)
-X( 4) = ( -3.64554399576877E-01,  7.33918043574087E-01)
-
-X( 5) = (  1.15704814093464E-01, -1.00812365276348E+00)
-
-PATH NUMBER =      3981
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12010917140228E+00,  1.74270785700203E-01)
-X( 2) = (  4.68695139425742E-01,  1.33913096890484E+00)
-X( 3) = ( -6.86420838389352E-01, -1.89903780762538E+00)
-X( 4) = ( -3.87191167717859E-01,  8.19160782330211E-01)
-
-X( 5) = (  1.22512098093517E-01, -1.93456157891833E+00)
-
-PATH NUMBER =      3982
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.32793507034331E-01,  3.42503431892713E-01)
-X( 2) = (  6.73417515024374E-02,  1.38851173187350E+00)
-X( 3) = ( -4.15836880978573E-01, -1.69119930990382E+00)
-X( 4) = ( -4.59324914450614E-01,  8.69909874586211E-01)
-
-X( 5) = (  3.19400231036062E+00, -1.27794544821563E+00)
-
-PATH NUMBER =      3983
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.04559078406897E-01,  2.86694166535110E-01)
-X( 2) = ( -2.71854123636310E-01,  1.16835460607980E+00)
-X( 3) = ( -3.42153555158181E-01, -1.35805776845443E+00)
-X( 4) = ( -5.47203458001590E-01,  8.62419256062171E-01)
-
-X( 5) = (  1.39499458398616E+00,  1.00102129078052E-01)
-
-PATH NUMBER =      3984
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.88990422594094E-01,  3.29567651391101E-02)
-X( 2) = ( -3.90178966270837E-01,  7.81673557456527E-01)
-X( 3) = ( -4.99848107978489E-01, -1.05549381297719E+00)
-X( 4) = ( -6.09707451182062E-01,  8.00193870414440E-01)
-
-X( 5) = (  8.57710718035450E-01, -8.30525772208451E-02)
-
-PATH NUMBER =      3985
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.86954509429477E-01, -2.99982222204997E-01)
-X( 2) = ( -2.32267267498303E-01,  4.09400946135664E-01)
-X( 3) = ( -8.15133505595138E-01, -9.25080480863706E-01)
-X( 4) = ( -6.17590580928381E-01,  7.12349667145721E-01)
-
-X( 5) = (  6.31289333637685E-01, -2.36721773642604E-01)
-
-PATH NUMBER =      3986
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.99403965309426E-01, -5.56336943114223E-01)
-X( 2) = (  1.27992333832578E-01,  2.25727264303463E-01)
-X( 3) = ( -1.14048420645641E+00, -1.02783961959262E+00)
-X( 4) = ( -5.67164243221016E-01,  6.39989925245019E-01)
-
-X( 5) = (  4.88442696679888E-01, -3.68399262667802E-01)
-
-PATH NUMBER =      3987
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.26931328715012E-01, -6.16156174609774E-01)
-X( 2) = (  5.22030366419604E-01,  3.16595468994805E-01)
-X( 3) = ( -1.32366500175905E+00, -1.31568908611205E+00)
-X( 4) = ( -4.82023481899561E-01,  6.16972572136627E-01)
-
-X( 5) = (  3.71012478695344E-01, -5.05819075565737E-01)
-
-PATH NUMBER =      3988
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.40407388754245E-01, -2.10986129872036E-01)
-X( 2) = (  8.77877967932844E-01,  7.12171342790047E-01)
-X( 3) = ( -1.04931581233111E+00, -1.60486513791294E+00)
-X( 4) = ( -3.88335445788758E-01,  3.05504584886732E-01)
-
-X( 5) = (  7.66805954100566E-01, -1.18597940958544E+00)
-
-PATH NUMBER =      3989
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.05619236150173E+00,  1.01177856394793E-01)
-X( 2) = (  8.56814241740709E-01,  1.11600215041594E+00)
-X( 3) = ( -7.97648437290227E-01, -1.83524754063342E+00)
-X( 4) = ( -3.50883239945148E-01,  3.85354945311474E-01)
-
-X( 5) = (  2.94150604067980E-01, -3.41954390732044E+00)
-
-PATH NUMBER =      3990
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.44233653908947E-01,  4.14734489286344E-01)
-X( 2) = (  5.81101051788209E-01,  1.41181499434788E+00)
-X( 3) = ( -4.56773089167279E-01, -1.84996202959123E+00)
-X( 4) = ( -3.73520008086131E-01,  4.70597684067597E-01)
-
-X( 5) = ( -1.64807313006460E+00,  5.23090939821585E+00)
-
-PATH NUMBER =      3991
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.56917989540993E-01,  5.82967135478855E-01)
-X( 2) = (  1.79747663864905E-01,  1.46119575731654E+00)
-X( 3) = ( -1.86189131756499E-01, -1.64212353186968E+00)
-X( 4) = ( -4.45653754818886E-01,  5.21346776323598E-01)
-
-X( 5) = (  4.92406157366640E-01,  1.56711951840613E+00)
-
-PATH NUMBER =      3992
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.28683560913560E-01,  5.27157870121252E-01)
-X( 2) = ( -1.59448211273841E-01,  1.24103863152284E+00)
-X( 3) = ( -1.12505805936108E-01, -1.30898199042029E+00)
-X( 4) = ( -5.33532298369861E-01,  5.13856157799558E-01)
-
-X( 5) = (  6.66360719750905E-01,  7.87916305881373E-01)
-
-PATH NUMBER =      3993
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13114905100757E-01,  2.73420468725252E-01)
-X( 2) = ( -2.77773053908368E-01,  8.54357582899568E-01)
-X( 3) = ( -2.70200358756416E-01, -1.00641803494304E+00)
-X( 4) = ( -5.96036291550333E-01,  4.51630772151827E-01)
-
-X( 5) = (  7.24953038428749E-01,  3.91726221539940E-01)
-
-PATH NUMBER =      3994
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11078991936141E-01, -5.95185186188550E-02)
-X( 2) = ( -1.19861355135835E-01,  4.82084971578705E-01)
-X( 3) = ( -5.85485756373065E-01, -8.76004702829560E-01)
-X( 4) = ( -6.03919421296652E-01,  3.63786568883108E-01)
-
-X( 5) = (  7.55817991602060E-01,  9.75646855485307E-02)
-
-PATH NUMBER =      3995
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.23528447816089E-01, -3.15873239528081E-01)
-X( 2) = (  2.40398246195046E-01,  2.98411289746504E-01)
-X( 3) = ( -9.10836457234341E-01, -9.78763841558471E-01)
-X( 4) = ( -5.53493083589287E-01,  2.91426826982406E-01)
-
-X( 5) = (  7.75622679282447E-01, -1.88236529077688E-01)
-
-PATH NUMBER =      3996
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.51055811221675E-01, -3.75692471023632E-01)
-X( 2) = (  6.34436278782072E-01,  3.89279494437846E-01)
-X( 3) = ( -1.09401725253698E+00, -1.26661330807790E+00)
-X( 4) = ( -4.68352322267832E-01,  2.68409473874014E-01)
-
-X( 5) = (  7.86397989281565E-01, -5.48507054017507E-01)
-
-PATH NUMBER =      3997
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.51111836653292E-01, -1.39830849459988E-01)
-X( 2) = (  9.17265501494903E-01,  8.40103664306312E-01)
-X( 3) = ( -9.04940732220838E-01, -1.41965618306580E+00)
-X( 4) = ( -1.53810689164721E-01,  4.72774124076453E-02)
-
-X( 5) = (  1.31512990833350E+00, -1.87140559811228E-02)
-
-PATH NUMBER =      3998
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.66896809400777E-01,  1.72333136806841E-01)
-X( 2) = (  8.96201775302769E-01,  1.24393447193221E+00)
-X( 3) = ( -6.53273357179954E-01, -1.65003858578628E+00)
-X( 4) = ( -1.16358483321111E-01,  1.27127772832387E-01)
-
-X( 5) = (  1.62414013399472E+00,  1.18952479184278E+00)
-
-PATH NUMBER =      3999
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.54938101807993E-01,  4.85889769698392E-01)
-X( 2) = (  6.20488585350270E-01,  1.53974731586414E+00)
-X( 3) = ( -3.12398009057005E-01, -1.66475307474408E+00)
-X( 4) = ( -1.38995251462093E-01,  2.12370511588511E-01)
-
-X( 5) = (  4.74023028799302E-01,  1.11896904217739E+00)
-
-PATH NUMBER =      4000
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.67622437440040E-01,  6.54122415890902E-01)
-X( 2) = (  2.19135197426965E-01,  1.58912807883281E+00)
-X( 3) = ( -4.18140516462258E-02, -1.45691457702253E+00)
-X( 4) = ( -2.11128998194848E-01,  2.63119603844511E-01)
-
-X( 5) = (  3.34712886670382E-01,  6.98234696499934E-01)
-
-PATH NUMBER =      4001
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.93880088126062E-02,  5.98313150533299E-01)
-X( 2) = ( -1.20060677711781E-01,  1.36897095303911E+00)
-X( 3) = (  3.18692741741659E-02, -1.12377303557314E+00)
-X( 4) = ( -2.99007541745823E-01,  2.55628985320471E-01)
-
-X( 5) = (  3.63492103421202E-01,  4.80418112186961E-01)
-
-PATH NUMBER =      4002
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.76180647000197E-01,  3.44575749137300E-01)
-X( 2) = ( -2.38385520346308E-01,  9.82289904415834E-01)
-X( 3) = ( -1.25825278646142E-01, -8.21209080095897E-01)
-X( 4) = ( -3.61511534926295E-01,  1.93403599672740E-01)
-
-X( 5) = (  4.20734802002591E-01,  3.38323014493114E-01)
-
-PATH NUMBER =      4003
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.78216560164813E-01,  1.16367617931929E-02)
-X( 2) = ( -8.04738215737751E-02,  6.10017293094970E-01)
-X( 3) = ( -4.41110676262791E-01, -6.90795747982412E-01)
-X( 4) = ( -3.69394664672614E-01,  1.05559396404021E-01)
-
-X( 5) = (  4.96488342621035E-01,  2.22550303849840E-01)
-
-PATH NUMBER =      4004
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.42328957151349E-02, -2.44717959116033E-01)
-X( 2) = (  2.79785779757106E-01,  4.26343611262769E-01)
-X( 3) = ( -7.66461377124067E-01, -7.93554886711323E-01)
-X( 4) = ( -3.18968326965249E-01,  3.31996545033194E-02)
-
-X( 5) = (  6.07713212984528E-01,  1.09960169140591E-01)
-
-PATH NUMBER =      4005
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.61760259120721E-01, -3.04537190611585E-01)
-X( 2) = (  6.73823812344132E-01,  5.17211815954111E-01)
-X( 3) = ( -9.49642172426707E-01, -1.08140435323076E+00)
-X( 4) = ( -2.33827565643795E-01,  1.01823013949268E-02)
-
-X( 5) = (  8.12111998935213E-01, -8.49138549815934E-03)
-
-PATH NUMBER =      4006
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.83760853934683E-01, -2.71278338729687E-01)
-X( 2) = (  8.65204791559192E-01,  9.63423326848963E-01)
-X( 3) = ( -9.13393025756246E-01, -1.18497537974688E+00)
-X( 4) = (  1.91830924374900E-01,  2.13529590397589E-04)
-
-X( 5) = (  6.89646390042707E-01,  9.44109247226474E-02)
-
-PATH NUMBER =      4007
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.99545826682169E-01,  4.08856475371428E-02)
-X( 2) = (  8.44141065367058E-01,  1.36725413447486E+00)
-X( 3) = ( -6.61725650715362E-01, -1.41535778246736E+00)
-X( 4) = (  2.29283130218511E-01,  8.00638900151393E-02)
-
-X( 5) = (  7.70367547196411E-01,  3.61466025458474E-01)
-
-PATH NUMBER =      4008
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.87587119089385E-01,  3.54442280428694E-01)
-X( 2) = (  5.68427875414558E-01,  1.66306697840679E+00)
-X( 3) = ( -3.20850302592413E-01, -1.43007227142517E+00)
-X( 4) = (  2.06646362077528E-01,  1.65306628771263E-01)
-
-X( 5) = (  5.18891696247820E-01,  5.07964132940352E-01)
-
-PATH NUMBER =      4009
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00271454721432E-01,  5.22674926621204E-01)
-X( 2) = (  1.67074487491254E-01,  1.71244774137546E+00)
-X( 3) = ( -5.02663451816336E-02, -1.22223377370361E+00)
-X( 4) = (  1.34512615344773E-01,  2.16055721027263E-01)
-
-X( 5) = (  3.62499553528811E-01,  4.06681666635218E-01)
-
-PATH NUMBER =      4010
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.27962973906002E-01,  4.66865661263602E-01)
-X( 2) = ( -1.72121387647493E-01,  1.49229061558176E+00)
-X( 3) = (  2.34169806387581E-02, -8.89092232254222E-01)
-X( 4) = (  4.66340717937976E-02,  2.08565102503223E-01)
-
-X( 5) = (  3.25755283412652E-01,  2.99284203563012E-01)
-
-PATH NUMBER =      4011
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.43531629718805E-01,  2.13128259867602E-01)
-X( 2) = ( -2.90446230282020E-01,  1.10560956695848E+00)
-X( 3) = ( -1.34277572181550E-01, -5.86528276776980E-01)
-X( 4) = ( -1.58699213866743E-02,  1.46339716855492E-01)
-
-X( 5) = (  3.34131776507564E-01,  2.16727857021903E-01)
-
-PATH NUMBER =      4012
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.45567542883422E-01, -1.19810727476505E-01)
-X( 2) = ( -1.32534531509487E-01,  7.33336955637621E-01)
-X( 3) = ( -4.49562969798199E-01, -4.56114944663495E-01)
-X( 4) = ( -2.37530511329934E-02,  5.84955135867730E-02)
-
-X( 5) = (  3.66033512620902E-01,  1.49751824559162E-01)
-
-PATH NUMBER =      4013
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.33118087003473E-01, -3.76165448385731E-01)
-X( 2) = (  2.27725069821394E-01,  5.49663273805419E-01)
-X( 3) = ( -7.74913670659474E-01, -5.58874083392406E-01)
-X( 4) = (  2.66732865743713E-02, -1.38642283139284E-02)
-
-X( 5) = (  4.22904270592596E-01,  9.25797349125993E-02)
-
-PATH NUMBER =      4014
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.44092764021127E-02, -4.35984679881283E-01)
-X( 2) = (  6.21763102408420E-01,  6.40531478496761E-01)
-X( 3) = ( -9.58094465962115E-01, -8.46723549911840E-01)
-X( 4) = (  1.11814047895826E-01, -3.68815814223208E-02)
-
-X( 5) = (  5.22476689471806E-01,  5.31751378722062E-02)
-
-PATH NUMBER =      4015
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.63450936687662E-01, -5.43822856575721E-01)
-X( 2) = (  7.46055622894969E-01,  1.02442768976891E+00)
-X( 3) = ( -1.07071777085534E+00, -1.01063248401572E+00)
-X( 4) = (  4.86859842476270E-01,  1.86334650261974E-01)
-
-X( 5) = (  4.83988523359885E-01, -1.73183685507045E-02)
-
-PATH NUMBER =      4016
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.79235909435148E-01, -2.31658870308892E-01)
-X( 2) = (  7.24991896702835E-01,  1.42825849739480E+00)
-X( 3) = ( -8.19050395814454E-01, -1.24101488673620E+00)
-X( 4) = (  5.24312048319880E-01,  2.66185010686715E-01)
-
-X( 5) = (  5.76297176717858E-01,  7.79492949170787E-02)
-
-PATH NUMBER =      4017
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67277201842364E-01,  8.18977625826591E-02)
-X( 2) = (  4.49278706750336E-01,  1.72407134132674E+00)
-X( 3) = ( -4.78175047691506E-01, -1.25572937569401E+00)
-X( 4) = (  5.01675280178897E-01,  3.51427749442839E-01)
-
-X( 5) = (  5.20457888356669E-01,  2.22593432756231E-01)
-
-PATH NUMBER =      4018
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.00384625255900E-02,  2.50130408775170E-01)
-X( 2) = (  4.79253188270312E-02,  1.77345210429540E+00)
-X( 3) = ( -2.07591090280726E-01, -1.04789087797245E+00)
-X( 4) = (  4.29541533446142E-01,  4.02176841698839E-01)
-
-X( 5) = (  3.97870249802336E-01,  2.35434206891212E-01)
-
-PATH NUMBER =      4019
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.48272891153024E-01,  1.94321143417566E-01)
-X( 2) = ( -2.91270556311715E-01,  1.55329497850170E+00)
-X( 3) = ( -1.33907764460335E-01, -7.14749336523061E-01)
-X( 4) = (  3.41662989895167E-01,  3.94686223174799E-01)
-
-X( 5) = (  3.33953132661331E-01,  1.82665872138277E-01)
-
-PATH NUMBER =      4020
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.63841546965826E-01, -5.94162579784336E-02)
-X( 2) = ( -4.09595398946242E-01,  1.16661392987843E+00)
-X( 3) = ( -2.91602317280643E-01, -4.12185381045820E-01)
-X( 4) = (  2.79158996714695E-01,  3.32460837527068E-01)
-
-X( 5) = (  3.13931459901834E-01,  1.25457296870943E-01)
-
-PATH NUMBER =      4021
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.65877460130443E-01, -3.92355245322540E-01)
-X( 2) = ( -2.51683700173709E-01,  7.94341318557565E-01)
-X( 3) = ( -6.06887714897292E-01, -2.81772048932335E-01)
-X( 4) = (  2.71275866968376E-01,  2.44616634258349E-01)
-
-X( 5) = (  3.18509490627435E-01,  7.36055429029469E-02)
-
-PATH NUMBER =      4022
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.53428004250495E-01, -6.48709966231766E-01)
-X( 2) = (  1.08575901157172E-01,  6.10667636725364E-01)
-X( 3) = ( -9.32238415758567E-01, -3.84531187661245E-01)
-X( 4) = (  3.21702204675741E-01,  1.72256892357648E-01)
-
-X( 5) = (  3.43151625364180E-01,  2.66880249608337E-02)
-
-PATH NUMBER =      4023
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.59006408449085E-02, -7.08529197727317E-01)
-X( 2) = (  5.02613933744197E-01,  7.01535841416706E-01)
-X( 3) = ( -1.11541921106121E+00, -6.72380654180680E-01)
-X( 4) = (  4.06842965997195E-01,  1.49239539249255E-01)
-
-X( 5) = (  3.94198878521172E-01, -1.18039352200593E-02)
-
-PATH NUMBER =      4024
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.46476432287900E-01, -8.29937794103016E-01)
-X( 2) = (  6.15569215715736E-01,  9.94572133667931E-01)
-X( 3) = ( -1.30330097081647E+00, -9.78204474390381E-01)
-X( 4) = (  5.93228755478567E-01,  5.18552633554296E-01)
-
-X( 5) = (  3.87321674280349E-01, -1.12423024642293E-01)
-
-PATH NUMBER =      4025
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.62261405035385E-01, -5.17773807836187E-01)
-X( 2) = (  5.94505489523601E-01,  1.39840294129383E+00)
-X( 3) = ( -1.05163359577559E+00, -1.20858687711086E+00)
-X( 4) = (  6.30680961322177E-01,  5.98402993979038E-01)
-
-X( 5) = (  4.77155282632834E-01, -9.12995047239369E-02)
-
-PATH NUMBER =      4026
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.50302697442602E-01, -2.04217174944635E-01)
-X( 2) = (  3.18792299571102E-01,  1.69421578522576E+00)
-X( 3) = ( -7.10758247652638E-01, -1.22330136606867E+00)
-X( 4) = (  6.08044193181195E-01,  6.83645732735161E-01)
-
-X( 5) = (  5.14124708772314E-01,  2.04793826124814E-02)
-
-PATH NUMBER =      4027
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.29870330746480E-02, -3.59845287521250E-02)
-X( 2) = ( -8.25610883522034E-02,  1.74359654819442E+00)
-X( 3) = ( -4.40174290241858E-01, -1.01546286834712E+00)
-X( 4) = (  5.35910446448439E-01,  7.34394824991162E-01)
-
-X( 5) = (  4.37284182231434E-01,  9.71630076659494E-02)
-
-PATH NUMBER =      4028
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.65247395552786E-01, -9.17937941097284E-02)
-X( 2) = ( -4.21756963490950E-01,  1.52343942240073E+00)
-X( 3) = ( -3.66490964421467E-01, -6.82321326897724E-01)
-X( 4) = (  4.48031902897464E-01,  7.26904206467121E-01)
-
-X( 5) = (  3.59662774803509E-01,  8.82348585096697E-02)
-
-PATH NUMBER =      4029
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.80816051365588E-01, -3.45531195505728E-01)
-X( 2) = ( -5.40081806125476E-01,  1.13675837377745E+00)
-X( 3) = ( -5.24185517241775E-01, -3.79757371420483E-01)
-X( 4) = (  3.85527909716992E-01,  6.64678820819391E-01)
-
-X( 5) = (  3.18498787089521E-01,  4.99255759569073E-02)
-
-PATH NUMBER =      4030
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.82851964530205E-01, -6.78470182849835E-01)
-X( 2) = ( -3.82170107352943E-01,  7.64485762456588E-01)
-X( 3) = ( -8.39470914858423E-01, -2.49344039306998E-01)
-X( 4) = (  3.77644779970673E-01,  5.76834617550672E-01)
-
-X( 5) = (  3.03058166035436E-01,  6.56410283566462E-03)
-
-PATH NUMBER =      4031
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.70402508650257E-01, -9.34824903759061E-01)
-X( 2) = ( -2.19105060220623E-02,  5.80812080624387E-01)
-X( 3) = ( -1.16482161571970E+00, -3.52103178035909E-01)
-X( 4) = (  4.28071117678038E-01,  5.04474875649970E-01)
-
-X( 5) = (  3.06545870009723E-01, -3.73888115330673E-02)
-
-PATH NUMBER =      4032
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71248547553293E-02, -9.94644135254612E-01)
-X( 2) = (  3.72127526564964E-01,  6.71680285315729E-01)
-X( 3) = ( -1.34800241102234E+00, -6.39952644555343E-01)
-X( 4) = (  5.13211878999492E-01,  4.81457522541578E-01)
-
-X( 5) = (  3.31049303819575E-01, -8.04605555629410E-02)
-
-PATH NUMBER =      4033
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.93988788618445E-01, -9.95746792229216E-01)
-X( 2) = (  5.34801610135531E-01,  8.87826405053226E-01)
-X( 3) = ( -1.50231436150349E+00, -1.10286477697175E+00)
-X( 4) = (  4.61166466829226E-01,  8.41418992893275E-01)
-
-X( 5) = (  3.25928603756442E-01, -2.00182102415775E-01)
-
-PATH NUMBER =      4034
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.09773761365930E-01, -6.83582805962387E-01)
-X( 2) = (  5.13737883943398E-01,  1.29165721267912E+00)
-X( 3) = ( -1.25064698646260E+00, -1.33324717969223E+00)
-X( 4) = (  4.98618672672837E-01,  9.21269353318016E-01)
-
-X( 5) = (  4.04172640974544E-01, -2.30167579008806E-01)
-
-PATH NUMBER =      4035
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.97815053773147E-01, -3.70026173070836E-01)
-X( 2) = (  2.38024693990898E-01,  1.58747005661106E+00)
-X( 3) = ( -9.09771638339655E-01, -1.34796166865003E+00)
-X( 4) = (  4.75981904531854E-01,  1.00651209207414E+00)
-
-X( 5) = (  5.02601480949481E-01, -1.68539511611838E-01)
-
-PATH NUMBER =      4036
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.10499389405193E-01, -2.01793526878325E-01)
-X( 2) = ( -1.63328693932407E-01,  1.63685081957972E+00)
-X( 3) = ( -6.39187680928876E-01, -1.14012317092848E+00)
-X( 4) = (  4.03848157799099E-01,  1.05726118433014E+00)
-
-X( 5) = (  4.89195258648088E-01, -4.65791692776523E-02)
-
-PATH NUMBER =      4037
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.77350392222405E-02, -2.57602792235929E-01)
-X( 2) = ( -5.02524569071153E-01,  1.41669369378602E+00)
-X( 3) = ( -5.65504355108485E-01, -8.06981629479088E-01)
-X( 4) = (  3.15969614248124E-01,  1.04977056580610E+00)
-
-X( 5) = (  4.04930065470654E-01, -5.53182823873123E-03)
-
-PATH NUMBER =      4038
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.33303695035043E-01, -5.11340193631928E-01)
-X( 2) = ( -6.20849411705680E-01,  1.03001264516275E+00)
-X( 3) = ( -7.23198907928792E-01, -5.04417674001848E-01)
-X( 4) = (  2.53465621067652E-01,  9.87545180158370E-01)
-
-X( 5) = (  3.41963617632690E-01, -2.31131732830062E-02)
-
-PATH NUMBER =      4039
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.35339608199660E-01, -8.44279180976035E-01)
-X( 2) = ( -4.62937712933147E-01,  6.57740033841884E-01)
-X( 3) = ( -1.03848430554544E+00, -3.74004341888362E-01)
-X( 4) = (  2.45582491321333E-01,  8.99700976889651E-01)
-
-X( 5) = (  3.06620518858213E-01, -5.90554865576759E-02)
-
-PATH NUMBER =      4040
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.28901523197110E-02, -1.10063390188526E+00)
-X( 2) = ( -1.02678111602266E-01,  4.74066352009682E-01)
-X( 3) = ( -1.36383500640672E+00, -4.76763480617274E-01)
-X( 4) = (  2.96008829028697E-01,  8.27341234988949E-01)
-
-X( 5) = (  2.91176183847679E-01, -1.01706585069587E-01)
-
-PATH NUMBER =      4041
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.04637211085875E-01, -1.16045313338081E+00)
-X( 2) = (  2.91359920984760E-01,  5.64934556701024E-01)
-X( 3) = ( -1.54701580170936E+00, -7.64612947136708E-01)
-X( 4) = (  3.81149590350152E-01,  8.04323881880557E-01)
-
-X( 5) = (  2.94587887966863E-01, -1.49580511455067E-01)
-
-PATH NUMBER =      4042
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.90174223358803E-01, -9.63665977969323E-01)
-X( 2) = (  5.41544866437285E-01,  7.54138016690241E-01)
-X( 3) = ( -1.57463736562647E+00, -1.32628345073705E+00)
-X( 4) = (  1.52466389096128E-01,  1.00386097048431E+00)
-
-X( 5) = (  2.78990108402420E-01, -2.97870016217964E-01)
-
-PATH NUMBER =      4043
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00595919610629E+00, -6.51501991702494E-01)
-X( 2) = (  5.20481140245151E-01,  1.15796882431614E+00)
-X( 3) = ( -1.32296999058558E+00, -1.55666585345753E+00)
-X( 4) = (  1.89918594939739E-01,  1.08371133090905E+00)
-
-X( 5) = (  3.34490565285074E-01, -3.77336530177173E-01)
-
-PATH NUMBER =      4044
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.94000488513505E-01, -3.37945358810943E-01)
-X( 2) = (  2.44767950292652E-01,  1.45378166824807E+00)
-X( 3) = ( -9.82094642462635E-01, -1.57138034241534E+00)
-X( 4) = (  1.67281826798756E-01,  1.16895406966518E+00)
-
-X( 5) = (  4.81377474683892E-01, -3.97264883494969E-01)
-
-PATH NUMBER =      4045
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.06684824145551E-01, -1.69712712618432E-01)
-X( 2) = ( -1.56585437630653E-01,  1.50316243121673E+00)
-X( 3) = ( -7.11510685051856E-01, -1.36354184469379E+00)
-X( 4) = (  9.51480800660006E-02,  1.21970316192118E+00)
-
-X( 5) = (  5.78674259729185E-01, -2.40797857757294E-01)
-
-PATH NUMBER =      4046
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.78450395518118E-01, -2.25521977976035E-01)
-X( 2) = ( -4.95781312769400E-01,  1.28300530542304E+00)
-X( 3) = ( -6.37827359231465E-01, -1.03040030324439E+00)
-X( 4) = (  7.26953651502560E-03,  1.21221254339714E+00)
-
-X( 5) = (  4.94124562036657E-01, -1.17011904896570E-01)
-
-PATH NUMBER =      4047
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.28817397053151E-02, -4.79259379372035E-01)
-X( 2) = ( -6.14106155403927E-01,  8.96324256799762E-01)
-X( 3) = ( -7.95521912051772E-01, -7.27836347767154E-01)
-X( 4) = ( -5.52344566654465E-02,  1.14998715774941E+00)
-
-X( 5) = (  3.96897283813079E-01, -1.03813435013477E-01)
-
-PATH NUMBER =      4048
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.08458265406981E-02, -8.12198366716142E-01)
-X( 2) = ( -4.56194456631393E-01,  5.24051645478899E-01)
-X( 3) = ( -1.11080730966842E+00, -5.97423015653668E-01)
-X( 4) = ( -6.31175864117653E-02,  1.06214295448069E+00)
-
-X( 5) = (  3.33571757495147E-01, -1.32009247480933E-01)
-
-PATH NUMBER =      4049
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.73295282420647E-01, -1.06855308762537E+00)
-X( 2) = ( -9.59348553005123E-02,  3.40377963646698E-01)
-X( 3) = ( -1.43615801052970E+00, -7.00182154382579E-01)
-X( 4) = ( -1.26912487044005E-02,  9.89783212579986E-01)
-
-X( 5) = (  2.94780250134493E-01, -1.75029474790540E-01)
-
-PATH NUMBER =      4050
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.00822645826232E-01, -1.12837231912092E+00)
-X( 2) = (  2.98103177286514E-01,  4.31246168338039E-01)
-X( 3) = ( -1.61933880583234E+00, -9.88031620902013E-01)
-X( 4) = (  7.24495126170545E-02,  9.66765859471594E-01)
-
-X( 5) = (  2.74746553509076E-01, -2.29221181470866E-01)
-
-PATH NUMBER =      4051
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15955720226349E+00, -7.62926092035123E-01)
-X( 2) = (  3.67349624756749E-01,  5.18823314436481E-01)
-X( 3) = ( -1.02439184900931E+00, -1.80029721600102E+00)
-X( 4) = ( -4.34393069959518E-01,  1.02069579330446E+00)
-
-X( 5) = (  5.37352503502204E-02, -4.08684359201455E-01)
-
-PATH NUMBER =      4052
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.27534217501098E+00, -4.50762105768293E-01)
-X( 2) = (  3.46285898564615E-01,  9.22654122062378E-01)
-X( 3) = ( -7.72724473968421E-01, -2.03067961872150E+00)
-X( 4) = ( -3.96940864115908E-01,  1.10054615372920E+00)
-
-X( 5) = ( -9.78855024223702E-03, -4.75769492703082E-01)
-
-PATH NUMBER =      4053
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.16338346741819E+00, -1.37205472876742E-01)
-X( 2) = (  7.05727086121152E-02,  1.21846696599431E+00)
-X( 3) = ( -4.31849125845472E-01, -2.04539410767931E+00)
-X( 4) = ( -4.19577632256891E-01,  1.18578889248533E+00)
-
-X( 5) = ( -4.56502963369815E-02, -6.07528458538548E-01)
-
-PATH NUMBER =      4054
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.76067803050241E-01,  3.10271733157674E-02)
-X( 2) = ( -3.30780679311189E-01,  1.26784772896297E+00)
-X( 3) = ( -1.61265168434694E-01, -1.83755560995775E+00)
-X( 4) = ( -4.91711378989645E-01,  1.23653798474133E+00)
-
-X( 5) = (  7.49079382353226E-02, -8.06109579772961E-01)
-
-PATH NUMBER =      4055
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.47833374422808E-01, -2.47820920418357E-02)
-X( 2) = ( -6.69976554449935E-01,  1.04769060316928E+00)
-X( 3) = ( -8.75818426143024E-02, -1.50441406850836E+00)
-X( 4) = ( -5.79589922540620E-01,  1.22904736621728E+00)
-
-X( 5) = (  3.82587838378471E-01, -7.34697359157084E-01)
-
-PATH NUMBER =      4056
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.32264718610005E-01, -2.78519493437835E-01)
-X( 2) = ( -7.88301397084462E-01,  6.61009554546001E-01)
-X( 3) = ( -2.45276395434610E-01, -1.20185011303112E+00)
-X( 4) = ( -6.42093915721092E-01,  1.16682198056955E+00)
-
-X( 5) = (  3.96437926655712E-01, -4.89371697742929E-01)
-
-PATH NUMBER =      4057
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.30228805445388E-01, -6.11458480781942E-01)
-X( 2) = ( -6.30389698311930E-01,  2.88736943225138E-01)
-X( 3) = ( -5.60561793051259E-01, -1.07143678091764E+00)
-X( 4) = ( -6.49977045467412E-01,  1.07897777730084E+00)
-
-X( 5) = (  2.92281028606584E-01, -3.89338196300392E-01)
-
-PATH NUMBER =      4058
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.42678261325337E-01, -8.67813201691168E-01)
-X( 2) = ( -2.70130096981048E-01,  1.05063261392937E-01)
-X( 3) = ( -8.85912493912535E-01, -1.17419591964655E+00)
-X( 4) = ( -5.99550707760047E-01,  1.00661803540013E+00)
-
-X( 5) = (  1.99647303150899E-01, -3.65843487993934E-01)
-
-PATH NUMBER =      4059
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.70205624730922E-01, -9.27632433186720E-01)
-X( 2) = (  1.23907935605978E-01,  1.95931466084279E-01)
-X( 3) = ( -1.06909328921518E+00, -1.46204538616598E+00)
-X( 4) = ( -5.14409946438592E-01,  9.83600682291742E-01)
-
-X( 5) = (  1.22718636742510E-01, -3.75263167794648E-01)
-
-PATH NUMBER =      4060
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17939582865156E+00, -4.65669604639225E-01)
-X( 2) = (  5.00177940272665E-01,  5.02249380508535E-01)
-X( 3) = ( -8.16926164786880E-01, -1.91031771673857E+00)
-X( 4) = ( -6.47972394849799E-01,  7.44893316782729E-01)
-
-X( 5) = ( -5.12065866216272E-02, -5.11980865841985E-01)
-
-PATH NUMBER =      4061
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.29518080139904E+00, -1.53505618372395E-01)
-X( 2) = (  4.79114214080530E-01,  9.06080188134433E-01)
-X( 3) = ( -5.65258789745996E-01, -2.14070011945905E+00)
-X( 4) = ( -6.10520189006189E-01,  8.24743677207470E-01)
-
-X( 5) = ( -1.86723481863931E-01, -5.50319194351549E-01)
-
-PATH NUMBER =      4062
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18322209380626E+00,  1.60051014519155E-01)
-X( 2) = (  2.03401024128031E-01,  1.20189303206637E+00)
-X( 3) = ( -2.24383441623047E-01, -2.15541460841686E+00)
-X( 4) = ( -6.33156957147171E-01,  9.09986415963594E-01)
-
-X( 5) = ( -3.59823272185404E-01, -6.62775697903965E-01)
-
-PATH NUMBER =      4063
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.95906429438305E-01,  3.28283660711665E-01)
-X( 2) = ( -1.97952363795273E-01,  1.25127379503503E+00)
-X( 3) = (  4.62005157877313E-02, -1.94757611069531E+00)
-X( 4) = ( -7.05290703879926E-01,  9.60735508219594E-01)
-
-X( 5) = ( -5.40439322652391E-01, -1.03672345322016E+00)
-
-PATH NUMBER =      4064
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.67672000810871E-01,  2.72474395354062E-01)
-X( 2) = ( -5.37148238934020E-01,  1.03111666924133E+00)
-X( 3) = (  1.19883841608123E-01, -1.61443456924591E+00)
-X( 4) = ( -7.93169247430901E-01,  9.53244889695554E-01)
-
-X( 5) = (  1.32542829464616E-01, -1.65799828250270E+00)
-
-PATH NUMBER =      4065
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.52103344998068E-01,  1.87369939580630E-02)
-X( 2) = ( -6.55473081568547E-01,  6.44435620618056E-01)
-X( 3) = ( -3.78107112121843E-02, -1.31187061376867E+00)
-X( 4) = ( -8.55673240611373E-01,  8.91019504047823E-01)
-
-X( 5) = (  5.96552600686840E-01, -9.28484275855223E-01)
-
-PATH NUMBER =      4066
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.50067431833451E-01, -3.14201993386044E-01)
-X( 2) = ( -4.97561382796014E-01,  2.72163009297193E-01)
-X( 3) = ( -3.53096108828834E-01, -1.18145728165519E+00)
-X( 4) = ( -8.63556370357693E-01,  8.03175300779104E-01)
-
-X( 5) = (  3.81741299994434E-01, -6.17975878109475E-01)
-
-PATH NUMBER =      4067
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.62516887713400E-01, -5.70556714295270E-01)
-X( 2) = ( -1.37301781465133E-01,  8.84893274649915E-02)
-X( 3) = ( -6.78446809690109E-01, -1.28421642038410E+00)
-X( 4) = ( -8.13130032650328E-01,  7.30815558878403E-01)
-
-X( 5) = (  2.07589691891222E-01, -5.30486662680914E-01)
-
-PATH NUMBER =      4068
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.90044251118985E-01, -6.30375945790821E-01)
-X( 2) = (  2.56736251121893E-01,  1.79357532156333E-01)
-X( 3) = ( -8.61627604992749E-01, -1.57206588690353E+00)
-X( 4) = ( -7.27989271328873E-01,  7.07798205770010E-01)
-
-X( 5) = (  7.25733600698487E-02, -5.06147432377752E-01)
-
-PATH NUMBER =      4069
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00352031115822E+00, -2.25205901053083E-01)
-X( 2) = (  6.12583852635133E-01,  5.74933405951576E-01)
-X( 3) = ( -5.87278415564807E-01, -1.86124193870443E+00)
-X( 4) = ( -6.34301235218070E-01,  3.96330218520115E-01)
-
-X( 5) = ( -1.72371408457719E-01, -7.64274596269365E-01)
-
-PATH NUMBER =      4070
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11930528390570E+00,  8.69580852137466E-02)
-X( 2) = (  5.91520126442998E-01,  9.78764213577474E-01)
-X( 3) = ( -3.35611040523922E-01, -2.09162434142491E+00)
-X( 4) = ( -5.96849029374460E-01,  4.76180578944857E-01)
-
-X( 5) = ( -4.94425430917098E-01, -7.26447485318186E-01)
-
-PATH NUMBER =      4071
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00734657631292E+00,  4.00514718105297E-01)
-X( 2) = (  3.15806936490499E-01,  1.27457705750941E+00)
-X( 3) = (  5.26430759902628E-03, -2.10633883038271E+00)
-X( 4) = ( -6.19485797515442E-01,  5.61423317700981E-01)
-
-X( 5) = ( -9.65733150841551E-01, -6.39175494947915E-01)
-
-PATH NUMBER =      4072
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.20030911944967E-01,  5.68747364297807E-01)
-X( 2) = ( -8.55464514328049E-02,  1.32395782047807E+00)
-X( 3) = (  2.75848265009805E-01, -1.89850033266116E+00)
-X( 4) = ( -6.91619544248197E-01,  6.12172409956981E-01)
-
-X( 5) = ( -2.02902967660586E+00, -2.92971406650112E-01)
-
-PATH NUMBER =      4073
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.91796483317533E-01,  5.12938098940204E-01)
-X( 2) = ( -4.24742326571552E-01,  1.10380069468437E+00)
-X( 3) = (  3.49531590830196E-01, -1.56535879121177E+00)
-X( 4) = ( -7.79498087799172E-01,  6.04681791432941E-01)
-
-X( 5) = ( -4.13026364409859E+00,  9.35620384709928E+00)
-
-PATH NUMBER =      4074
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.76227827504731E-01,  2.59200697544204E-01)
-X( 2) = ( -5.43067169206079E-01,  7.17119646061096E-01)
-X( 3) = (  1.91837038009889E-01, -1.26279483573453E+00)
-X( 4) = ( -8.42002080979644E-01,  5.42456405785210E-01)
-
-X( 5) = (  2.40470108457093E+00, -4.39658877040860E-01)
-
-PATH NUMBER =      4075
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.74191914340114E-01, -7.37382897999023E-02)
-X( 2) = ( -3.85155470433546E-01,  3.44847034740233E-01)
-X( 3) = ( -1.23448359606761E-01, -1.13238150362104E+00)
-X( 4) = ( -8.49885210725964E-01,  4.54612202516491E-01)
-
-X( 5) = (  9.97915745595864E-01, -7.56916590783412E-01)
-
-PATH NUMBER =      4076
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.86641370220062E-01, -3.30093010709128E-01)
-X( 2) = ( -2.48958691026647E-02,  1.61173352908032E-01)
-X( 3) = ( -4.48799060468036E-01, -1.23514064234995E+00)
-X( 4) = ( -7.99458873018599E-01,  3.82252460615790E-01)
-
-X( 5) = (  4.60287914957622E-01, -7.88370287316034E-01)
-
-PATH NUMBER =      4077
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.14168733625648E-01, -3.89912242204680E-01)
-X( 2) = (  3.69142163484361E-01,  2.52041557599374E-01)
-X( 3) = ( -6.31979855770677E-01, -1.52299010886939E+00)
-X( 4) = ( -7.14318111697144E-01,  3.59235107507397E-01)
-
-X( 5) = (  1.19493856628886E-01, -7.83604796203029E-01)
-
-PATH NUMBER =      4078
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.14224759057265E-01, -1.54050620641036E-01)
-X( 2) = (  6.51971386197193E-01,  7.02865727467841E-01)
-X( 3) = ( -4.42903335454533E-01, -1.67603298385728E+00)
-X( 4) = ( -3.99776478594032E-01,  1.38103046041029E-01)
-
-X( 5) = (  2.12755039587307E-01, -1.48161979888674E+00)
-
-PATH NUMBER =      4079
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.30009731804751E-01,  1.58113365625794E-01)
-X( 2) = (  6.30907660005058E-01,  1.10669653509374E+00)
-X( 3) = ( -1.91235960413649E-01, -1.90641538657776E+00)
-X( 4) = ( -3.62324272750422E-01,  2.17953406465771E-01)
-
-X( 5) = ( -1.34000321459438E+00, -1.80835565659576E+00)
-
-PATH NUMBER =      4080
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.18051024211967E-01,  4.71669998517344E-01)
-X( 2) = (  3.55194470052558E-01,  1.40250937902567E+00)
-X( 3) = (  1.49639387709300E-01, -1.92112987553556E+00)
-X( 4) = ( -3.84961040891405E-01,  3.03196145221894E-01)
-
-X( 5) = ( -2.64776863844526E+00,  8.24594943375505E-01)
-
-PATH NUMBER =      4081
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.30735359844013E-01,  6.39902644709855E-01)
-X( 2) = ( -4.61589178707454E-02,  1.45189014199433E+00)
-X( 3) = (  4.20223345120079E-01, -1.71329137781401E+00)
-X( 4) = ( -4.57094787624160E-01,  3.53945237477894E-01)
-
-X( 5) = ( -3.88077324108194E-01,  1.86441875608634E+00)
-
-PATH NUMBER =      4082
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02500931216580E-01,  5.84093379352251E-01)
-X( 2) = ( -3.85354793009492E-01,  1.23173301620064E+00)
-X( 3) = (  4.93906670940470E-01, -1.38014983636462E+00)
-X( 4) = ( -5.44973331175135E-01,  3.46454618953854E-01)
-
-X( 5) = (  5.93782013276666E-01,  1.18874800923538E+00)
-
-PATH NUMBER =      4083
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.13067724596223E-01,  3.30355977956252E-01)
-X( 2) = ( -5.03679635644019E-01,  8.45051967577362E-01)
-X( 3) = (  3.36212118120162E-01, -1.07758588088738E+00)
-X( 4) = ( -6.07477324355607E-01,  2.84229233306123E-01)
-
-X( 5) = (  8.98705543121345E-01,  5.89251185976262E-01)
-
-PATH NUMBER =      4084
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.15103637760840E-01, -2.58300938785454E-03)
-X( 2) = ( -3.45767936871486E-01,  4.72779356256499E-01)
-X( 3) = (  2.09267205035135E-02, -9.47172548773894E-01)
-X( 4) = ( -6.15360454101926E-01,  1.96385030037404E-01)
-
-X( 5) = (  9.78441107465574E-01,  9.79526907096568E-02)
-
-PATH NUMBER =      4085
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.73458181191087E-02, -2.58937730297081E-01)
-X( 2) = (  1.44916644593951E-02,  2.89105674424298E-01)
-X( 3) = ( -3.04423980357762E-01, -1.04993168750281E+00)
-X( 4) = ( -5.64934116394561E-01,  1.24025288136703E-01)
-
-X( 5) = (  9.35085349421584E-01, -3.64915038305544E-01)
-
-PATH NUMBER =      4086
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.24873181524695E-01, -3.18756961792632E-01)
-X( 2) = (  4.08529697046421E-01,  3.79973879115639E-01)
-X( 3) = ( -4.87604775660403E-01, -1.33778115402224E+00)
-X( 4) = ( -4.79793355073106E-01,  1.01007935028310E-01)
-
-X( 5) = (  7.44337747587880E-01, -8.72438217596635E-01)
-
-PATH NUMBER =      4087
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.46873776338657E-01, -2.85498109910734E-01)
-X( 2) = (  5.99910676261480E-01,  8.26185390010491E-01)
-X( 3) = ( -4.51355628989941E-01, -1.44135218053836E+00)
-X( 4) = ( -5.41348650544116E-02,  9.10391632237813E-02)
-
-X( 5) = (  9.69060838758867E-01, -5.82439681842414E-01)
-
-PATH NUMBER =      4088
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.62658749086143E-01,  2.66658763560957E-02)
-X( 2) = (  5.78846950069346E-01,  1.23001619763639E+00)
-X( 3) = ( -1.99688253949057E-01, -1.67173458325884E+00)
-X( 4) = ( -1.66826592108015E-02,  1.70889523648523E-01)
-
-X( 5) = (  2.19283667841582E+00, -8.32398104081900E-01)
-
-PATH NUMBER =      4089
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.50700041493359E-01,  3.40222509247647E-01)
-X( 2) = (  3.03133760116847E-01,  1.52582904156832E+00)
-X( 3) = (  1.41187094173892E-01, -1.68644907221665E+00)
-X( 4) = ( -3.93194273517843E-02,  2.56132262404646E-01)
-
-X( 5) = (  1.59771872093208E+00,  1.56794826329181E+00)
-
-PATH NUMBER =      4090
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.63384377125406E-01,  5.08455155440157E-01)
-X( 2) = ( -9.82196278064569E-02,  1.57520980453698E+00)
-X( 3) = (  4.11771051584671E-01, -1.47861057449510E+00)
-X( 4) = ( -1.11453174084539E-01,  3.06881354660647E-01)
-
-X( 5) = (  6.72191715708664E-01,  8.69998734607397E-01)
-
-PATH NUMBER =      4091
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.64850051502028E-01,  4.52645890082554E-01)
-X( 2) = ( -4.37415502945204E-01,  1.35505267874329E+00)
-X( 3) = (  4.85454377405063E-01, -1.14546903304570E+00)
-X( 4) = ( -1.99331717635514E-01,  2.99390736136606E-01)
-
-X( 5) = (  5.64220546298913E-01,  4.96197924719265E-01)
-
-PATH NUMBER =      4092
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.80418707314831E-01,  1.98908488686554E-01)
-X( 2) = ( -5.55740345579731E-01,  9.68371630120012E-01)
-X( 3) = (  3.27759824584755E-01, -8.42905077568462E-01)
-X( 4) = ( -2.61835710815986E-01,  2.37165350488875E-01)
-
-X( 5) = (  5.56520840636255E-01,  2.76425482964806E-01)
-
-PATH NUMBER =      4093
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.82454620479448E-01, -1.34030498657552E-01)
-X( 2) = ( -3.97828646807198E-01,  5.96099018799149E-01)
-X( 3) = (  1.24744269681057E-02, -7.12491745454977E-01)
-X( 4) = ( -2.69718840562305E-01,  1.49321147220157E-01)
-
-X( 5) = (  5.77611869875661E-01,  1.05856462973194E-01)
-
-PATH NUMBER =      4094
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.70005164599499E-01, -3.90385219566779E-01)
-X( 2) = ( -3.75690454763169E-02,  4.12425336966948E-01)
-X( 3) = ( -3.12876273893170E-01, -8.15250884183888E-01)
-X( 4) = ( -2.19292502854940E-01,  7.69614053194551E-02)
-
-X( 5) = (  6.22435735339254E-01, -6.12232094497768E-02)
-
-PATH NUMBER =      4095
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.57522198806087E-01, -4.50204451062330E-01)
-X( 2) = (  3.56468987110709E-01,  5.03293541658290E-01)
-X( 3) = ( -4.96057069195811E-01, -1.10310035070332E+00)
-X( 4) = ( -1.34151741533486E-01,  5.39440522110628E-02)
-
-X( 5) = (  7.14537215208984E-01, -2.66082047941410E-01)
-
-PATH NUMBER =      4096
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.26563859091636E-01, -5.58042627756768E-01)
-X( 2) = (  4.80761507597259E-01,  8.87189752930436E-01)
-X( 3) = ( -6.08680374089034E-01, -1.26700928480720E+00)
-X( 4) = (  2.40894053046958E-01,  2.77160283895357E-01)
-
-X( 5) = (  5.63867255027183E-01, -2.92093278309791E-01)
-
-PATH NUMBER =      4097
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.42348831839121E-01, -2.45878641489939E-01)
-X( 2) = (  4.59697781405124E-01,  1.29102056055633E+00)
-X( 3) = ( -3.57012999048149E-01, -1.49739168752768E+00)
-X( 4) = (  2.78346258890568E-01,  3.57010644320099E-01)
-
-X( 5) = (  8.27412849712056E-01, -3.34539262406243E-01)
-
-PATH NUMBER =      4098
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.30390124246338E-01,  6.76779914016121E-02)
-X( 2) = (  1.83984591452625E-01,  1.58683340448827E+00)
-X( 3) = ( -1.61376509252011E-02, -1.51210617648549E+00)
-X( 4) = (  2.55709490749586E-01,  4.42253383076222E-01)
-
-X( 5) = (  1.04053100985445E+00,  4.79575732902678E-02)
-
-PATH NUMBER =      4099
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.30744598783838E-02,  2.35910637594122E-01)
-X( 2) = ( -2.17368796470679E-01,  1.63621416745693E+00)
-X( 3) = (  2.54446306485578E-01, -1.30426767876393E+00)
-X( 4) = (  1.83575744016831E-01,  4.93002475332222E-01)
-
-X( 5) = (  7.31868635962898E-01,  2.75954673534082E-01)
-
-PATH NUMBER =      4100
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.85159968749050E-01,  1.80101372236519E-01)
-X( 2) = ( -5.56564671609426E-01,  1.41605704166323E+00)
-X( 3) = (  3.28129632305970E-01, -9.71126137314543E-01)
-X( 4) = (  9.56972004658557E-02,  4.85511856808182E-01)
-
-X( 5) = (  5.35705340126058E-01,  1.99380402741847E-01)
-
-PATH NUMBER =      4101
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.00728624561852E-01, -7.36360291594804E-02)
-X( 2) = ( -6.74889514243953E-01,  1.02937599303996E+00)
-X( 3) = (  1.70435079485662E-01, -6.68562181837302E-01)
-X( 4) = (  3.31932072853839E-02,  4.23286471160451E-01)
-
-X( 5) = (  4.59231318028629E-01,  9.86656624162256E-02)
-
-PATH NUMBER =      4102
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.02764537726469E-01, -4.06575016503588E-01)
-X( 2) = ( -5.16977815471420E-01,  6.57103381719094E-01)
-X( 3) = ( -1.44850318130987E-01, -5.38148849723817E-01)
-X( 4) = (  2.53100775390647E-02,  3.35442267891732E-01)
-
-X( 5) = (  4.31812331278403E-01,  7.13994224713923E-03)
-
-PATH NUMBER =      4103
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.90315081846521E-01, -6.62929737412814E-01)
-X( 2) = ( -1.56718214140539E-01,  4.73429699886892E-01)
-X( 3) = ( -4.70201018992263E-01, -6.40907988452728E-01)
-X( 4) = (  7.57364152464295E-02,  2.63082525991031E-01)
-
-X( 5) = (  4.32451018989802E-01, -8.24060746532584E-02)
-
-PATH NUMBER =      4104
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.72122815590652E-02, -7.22748968908365E-01)
-X( 2) = (  2.37319818446487E-01,  5.64297904578234E-01)
-X( 3) = ( -6.53381814294903E-01, -9.28757454972162E-01)
-X( 4) = (  1.60877176567884E-01,  2.40065172882639E-01)
-
-X( 5) = (  4.64788588216756E-01, -1.80613375458959E-01)
-
-PATH NUMBER =      4105
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.09589354691875E-01, -8.44157565284063E-01)
-X( 2) = (  3.50275100418024E-01,  8.57334196829459E-01)
-X( 3) = ( -8.41263574050166E-01, -1.23458127518186E+00)
-X( 4) = (  3.47262966049254E-01,  6.09378267187680E-01)
-
-X( 5) = (  3.61670842885403E-01, -2.82779426963799E-01)
-
-PATH NUMBER =      4106
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.25374327439360E-01, -5.31993579017233E-01)
-X( 2) = (  3.29211374225890E-01,  1.26116500445536E+00)
-X( 3) = ( -5.89596199009281E-01, -1.46496367790234E+00)
-X( 4) = (  3.84715171892864E-01,  6.89228627612421E-01)
-
-X( 5) = (  4.65173455704467E-01, -3.55729558940805E-01)
-
-PATH NUMBER =      4107
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.13415619846576E-01, -2.18436946125683E-01)
-X( 2) = (  5.34981842733907E-02,  1.55697784838729E+00)
-X( 3) = ( -2.48720850886333E-01, -1.47967816686015E+00)
-X( 4) = (  3.62078403751882E-01,  7.74471366368545E-01)
-
-X( 5) = (  6.51895271100116E-01, -2.92643276975743E-01)
-
-PATH NUMBER =      4108
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26099955478622E-01, -5.02042999331721E-02)
-X( 2) = ( -3.47855203649913E-01,  1.60635861135595E+00)
-X( 3) = (  2.18631065244461E-02, -1.27183966913860E+00)
-X( 4) = (  2.89944657019127E-01,  8.25220458624545E-01)
-
-X( 5) = (  6.52638624761839E-01, -7.16709724757796E-02)
-
-PATH NUMBER =      4109
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.02134473148811E-01, -1.06013565290775E-01)
-X( 2) = ( -6.87051078788660E-01,  1.38620148556226E+00)
-X( 3) = (  9.55464323448375E-02, -9.38698127689206E-01)
-X( 4) = (  2.02066113468152E-01,  8.17729840100505E-01)
-
-X( 5) = (  5.10907115628149E-01, -1.85415470736756E-03)
-
-PATH NUMBER =      4110
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.17703128961614E-01, -3.59750966686775E-01)
-X( 2) = ( -8.05375921423187E-01,  9.99520436938980E-01)
-X( 3) = ( -6.21481204754702E-02, -6.36134172211965E-01)
-X( 4) = (  1.39562120287680E-01,  7.55504454452774E-01)
-
-X( 5) = (  4.14726340802881E-01, -2.94082589577123E-02)
-
-PATH NUMBER =      4111
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.19739042126231E-01, -6.92689954030882E-01)
-X( 2) = ( -6.47464222650654E-01,  6.27247825618117E-01)
-X( 3) = ( -3.77433518092119E-01, -5.05720840098480E-01)
-X( 4) = (  1.31678990541361E-01,  6.67660251184055E-01)
-
-X( 5) = (  3.62288452306185E-01, -7.96776705264902E-02)
-
-PATH NUMBER =      4112
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.07289586246282E-01, -9.49044674940108E-01)
-X( 2) = ( -2.87204621319773E-01,  4.43574143785916E-01)
-X( 3) = ( -7.02784218953395E-01, -6.08479978827391E-01)
-X( 4) = (  1.82105328248726E-01,  5.95300509283354E-01)
-
-X( 5) = (  3.36083760917075E-01, -1.37452967447987E-01)
-
-PATH NUMBER =      4113
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.20237777159303E-01, -1.00886390643566E+00)
-X( 2) = (  1.06833411267253E-01,  5.34442348477257E-01)
-X( 3) = ( -8.85965014256036E-01, -8.96329445346825E-01)
-X( 4) = (  2.67246089570180E-01,  5.72283156174962E-01)
-
-X( 5) = (  3.31945136108790E-01, -2.03954005214684E-01)
-
-PATH NUMBER =      4114
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.57101711022419E-01, -1.00996656341026E+00)
-X( 2) = (  2.69507494837821E-01,  7.50588468214754E-01)
-X( 3) = ( -1.04027696473718E+00, -1.35924157776323E+00)
-X( 4) = (  2.15200677399915E-01,  9.32244626526659E-01)
-
-X( 5) = (  2.39765265167621E-01, -3.09776748995692E-01)
-
-PATH NUMBER =      4115
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.72886683769904E-01, -6.97802577143434E-01)
-X( 2) = (  2.48443768645687E-01,  1.15441927584065E+00)
-X( 3) = ( -7.88609589696300E-01, -1.58962398048371E+00)
-X( 4) = (  2.52652883243525E-01,  1.01209498695140E+00)
-
-X( 5) = (  2.74252687691964E-01, -3.90838307266108E-01)
-
-PATH NUMBER =      4116
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.60927976177121E-01, -3.84245944251883E-01)
-X( 2) = ( -2.72694213068123E-02,  1.45023211977259E+00)
-X( 3) = ( -4.47734241573351E-01, -1.60433846944152E+00)
-X( 4) = (  2.30016115102543E-01,  1.09733772570752E+00)
-
-X( 5) = (  3.97641130948421E-01, -4.42591274840041E-01)
-
-PATH NUMBER =      4117
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.73612311809167E-01, -2.16013298059373E-01)
-X( 2) = ( -4.28622809230117E-01,  1.49961288274125E+00)
-X( 3) = ( -1.77150284162571E-01, -1.39649997171996E+00)
-X( 4) = (  1.57882368369787E-01,  1.14808681796352E+00)
-
-X( 5) = (  5.30974293200712E-01, -3.29140483066092E-01)
-
-PATH NUMBER =      4118
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.53778831817334E-02, -2.71822563416976E-01)
-X( 2) = ( -7.67818684368864E-01,  1.27945575694755E+00)
-X( 3) = ( -1.03466958342180E-01, -1.06335843027057E+00)
-X( 4) = (  7.00038248188124E-02,  1.14059619943948E+00)
-
-X( 5) = (  4.84645377436505E-01, -1.83831248856692E-01)
-
-PATH NUMBER =      4119
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.70190772631069E-01, -5.25559964812975E-01)
-X( 2) = ( -8.86143527003390E-01,  8.92774708324276E-01)
-X( 3) = ( -2.61161511162488E-01, -7.60794474793330E-01)
-X( 4) = (  7.49983163834062E-03,  1.07837081379175E+00)
-
-X( 5) = (  3.89809450526936E-01, -1.47062015711164E-01)
-
-PATH NUMBER =      4120
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.72226685795686E-01, -8.58498952157082E-01)
-X( 2) = ( -7.28231828230858E-01,  5.20502097003412E-01)
-X( 3) = ( -5.76446908779137E-01, -6.30381142679844E-01)
-X( 4) = ( -3.83298107978696E-04,  9.90526610523034E-01)
-
-X( 5) = (  3.20940086625311E-01, -1.62597732410560E-01)
-
-PATH NUMBER =      4121
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.02227700842628E-02, -1.11485367306631E+00)
-X( 2) = ( -3.67972226899977E-01,  3.36828415171211E-01)
-X( 3) = ( -9.01797609640413E-01, -7.33140281408756E-01)
-X( 4) = (  5.00430395993859E-02,  9.18166868622333E-01)
-
-X( 5) = (  2.75479966659211E-01, -1.97746279315854E-01)
-
-PATH NUMBER =      4122
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.67750133489848E-01, -1.17467290456186E+00)
-X( 2) = (  2.60658056870494E-02,  4.27696619862553E-01)
-X( 3) = ( -1.08497840494305E+00, -1.02098974792819E+00)
-X( 4) = (  1.35183800920841E-01,  8.95149515513940E-01)
-
-X( 5) = (  2.47419985722260E-01, -2.45876295015389E-01)
-
-PATH NUMBER =      4123
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.53287145762778E-01, -9.77885749150370E-01)
-X( 2) = (  2.76250751139574E-01,  6.16900079851769E-01)
-X( 3) = ( -1.11259996886016E+00, -1.58266025152853E+00)
-X( 4) = ( -9.34994003331839E-02,  1.09468660411770E+00)
-
-X( 5) = (  1.44921035481883E-01, -3.50032982984136E-01)
-
-PATH NUMBER =      4124
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06907211851026E+00, -6.65721762883540E-01)
-X( 2) = (  2.55187024947440E-01,  1.02073088747767E+00)
-X( 3) = ( -8.60932593819279E-01, -1.81304265424901E+00)
-X( 4) = ( -5.60471944895734E-02,  1.17453696454244E+00)
-
-X( 5) = (  1.30599483241450E-01, -4.28708370628631E-01)
-
-PATH NUMBER =      4125
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.57113410917480E-01, -3.52165129991990E-01)
-X( 2) = ( -2.05261650050588E-02,  1.31654373140960E+00)
-X( 3) = ( -5.20057245696331E-01, -1.82775714320682E+00)
-X( 4) = ( -7.86839626305558E-02,  1.25977970329856E+00)
-
-X( 5) = (  1.83118321251747E-01, -5.36150558806876E-01)
-
-PATH NUMBER =      4126
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.69797746549525E-01, -1.83932483799479E-01)
-X( 2) = ( -4.21879552928364E-01,  1.36592449437826E+00)
-X( 3) = ( -2.49473288285551E-01, -1.61991864548527E+00)
-X( 4) = ( -1.50817709363312E-01,  1.31052879555456E+00)
-
-X( 5) = (  3.59203322058748E-01, -5.61840345204476E-01)
-
-PATH NUMBER =      4127
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.41563317922092E-01, -2.39741749157083E-01)
-X( 2) = ( -7.61075428067110E-01,  1.14576736858457E+00)
-X( 3) = ( -1.75789962465160E-01, -1.28677710403588E+00)
-X( 4) = ( -2.38696252914286E-01,  1.30303817703052E+00)
-
-X( 5) = (  4.49280877580996E-01, -3.96571649691749E-01)
-
-PATH NUMBER =      4128
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25994662109289E-01, -4.93479150553082E-01)
-X( 2) = ( -8.79400270701637E-01,  7.59086319961291E-01)
-X( 3) = ( -3.33484515285468E-01, -9.84213148558636E-01)
-X( 4) = ( -3.01200246094758E-01,  1.24081279138279E+00)
-
-X( 5) = (  3.78555995718849E-01, -2.83379552914337E-01)
-
-PATH NUMBER =      4129
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23958748944672E-01, -8.26418137897189E-01)
-X( 2) = ( -7.21488571929104E-01,  3.86813708640427E-01)
-X( 3) = ( -6.48769912902117E-01, -8.53799816445150E-01)
-X( 4) = ( -3.09083375841077E-01,  1.15296858811407E+00)
-
-X( 5) = (  2.95421039775081E-01, -2.57021112541411E-01)
-
-PATH NUMBER =      4130
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.36408204824621E-01, -1.08277285880642E+00)
-X( 2) = ( -3.61228970598223E-01,  2.03140026808226E-01)
-X( 3) = ( -9.74120613763393E-01, -9.56558955174062E-01)
-X( 4) = ( -2.58657038133713E-01,  1.08060884621337E+00)
-
-X( 5) = (  2.31094523587931E-01, -2.68321139602667E-01)
-
-PATH NUMBER =      4131
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.63935568230207E-01, -1.14259209030197E+00)
-X( 2) = (  3.28090619888027E-02,  2.94008231499568E-01)
-X( 3) = ( -1.15730140906603E+00, -1.24440842169350E+00)
-X( 4) = ( -1.73516276812258E-01,  1.05759149310498E+00)
-
-X( 5) = (  1.81673780202858E-01, -2.99478604945346E-01)
-
-PATH NUMBER =      4132
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21704479848781E+00, -7.33250864198405E-01)
-X( 2) = (  2.52337387319486E-01,  2.43165185300136E-01)
-X( 3) = ( -5.05654837743481E-01, -1.69970132573875E+00)
-X( 4) = ( -6.81195388090682E-01,  9.32168503390143E-01)
-
-X( 5) = ( -9.40127071510571E-02, -3.80664218799998E-01)
-
-PATH NUMBER =      4133
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.33282977123530E+00, -4.21086877931576E-01)
-X( 2) = (  2.31273661127352E-01,  6.46995992926033E-01)
-X( 3) = ( -2.53987462702598E-01, -1.93008372845923E+00)
-X( 4) = ( -6.43743182247072E-01,  1.01201886381489E+00)
-
-X( 5) = ( -1.71585673153489E-01, -3.83762556013255E-01)
-
-PATH NUMBER =      4134
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22087106364251E+00, -1.07530245040025E-01)
-X( 2) = ( -4.44395288251478E-02,  9.42808836857967E-01)
-X( 3) = (  8.68878854203516E-02, -1.94479821741704E+00)
-X( 4) = ( -6.66379950388055E-01,  1.09726160257101E+00)
-
-X( 5) = ( -2.61414952551037E-01, -4.24799537778512E-01)
-
-PATH NUMBER =      4135
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.33555399274560E-01,  6.07024011524854E-02)
-X( 2) = ( -4.45792916748452E-01,  9.92189599826629E-01)
-X( 3) = (  3.57471842831131E-01, -1.73695971969549E+00)
-X( 4) = ( -7.38513697120810E-01,  1.14801069482701E+00)
-
-X( 5) = ( -3.45678410125019E-01, -5.52680887462268E-01)
-
-PATH NUMBER =      4136
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.05320970647126E-01,  4.89313579488212E-03)
-X( 2) = ( -7.84988791887199E-01,  7.72032474032933E-01)
-X( 3) = (  4.31155168651522E-01, -1.40381817824609E+00)
-X( 4) = ( -8.26392240671785E-01,  1.14052007630297E+00)
-
-X( 5) = ( -2.57082175141251E-01, -7.92728929210018E-01)
-
-PATH NUMBER =      4137
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.89752314834323E-01, -2.48844265601117E-01)
-X( 2) = ( -9.03313634521726E-01,  3.85351425409657E-01)
-X( 3) = (  2.73460615831215E-01, -1.10125422276885E+00)
-X( 4) = ( -8.88896233852257E-01,  1.07829469065524E+00)
-
-X( 5) = (  4.20249657613551E-02, -7.64300058434599E-01)
-
-PATH NUMBER =      4138
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.87716401669706E-01, -5.81783252945224E-01)
-X( 2) = ( -7.45401935749193E-01,  1.30788140887935E-02)
-X( 3) = ( -4.18247817854341E-02, -9.70840890655367E-01)
-X( 4) = ( -8.96779363598576E-01,  9.90450487386519E-01)
-
-X( 5) = (  1.00842133141627E-01, -5.65669730304620E-01)
-
-PATH NUMBER =      4139
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.00165857549655E-01, -8.38137973854450E-01)
-X( 2) = ( -3.85142334418312E-01, -1.70594867743408E-01)
-X( 3) = ( -3.67175482646710E-01, -1.07360002938428E+00)
-X( 4) = ( -8.46353025891211E-01,  9.18090745485817E-01)
-
-X( 5) = (  4.62907407921887E-02, -4.54666887528890E-01)
-
-PATH NUMBER =      4140
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.27693220955241E-01, -8.97957205350002E-01)
-X( 2) = (  8.89569816871433E-03, -7.97266630520660E-02)
-X( 3) = ( -5.50356277949350E-01, -1.36144949590371E+00)
-X( 4) = ( -7.61212264569757E-01,  8.95073392377424E-01)
-
-X( 5) = ( -2.28063251348711E-02, -4.02254472513926E-01)
-
-PATH NUMBER =      4141
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23688342487587E+00, -4.35994376802507E-01)
-X( 2) = (  3.85165702835402E-01,  2.26591251372190E-01)
-X( 3) = ( -2.98189153521055E-01, -1.80972182647630E+00)
-X( 4) = ( -8.94774712980963E-01,  6.56366026868412E-01)
-
-X( 5) = ( -2.12537443646176E-01, -3.79995275727563E-01)
-
-PATH NUMBER =      4142
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.35266839762336E+00, -1.23830390535677E-01)
-X( 2) = (  3.64101976643267E-01,  6.30422058998088E-01)
-X( 3) = ( -4.65217784801711E-02, -2.04010422919678E+00)
-X( 4) = ( -8.57322507137353E-01,  7.36216387293154E-01)
-
-X( 5) = ( -2.91293763651143E-01, -3.34487946048251E-01)
-
-PATH NUMBER =      4143
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24070969003058E+00,  1.89726242355874E-01)
-X( 2) = (  8.83887866907675E-02,  9.26234902930022E-01)
-X( 3) = (  2.94353569642777E-01, -2.05481871815459E+00)
-X( 4) = ( -8.79959275278336E-01,  8.21459126049277E-01)
-
-X( 5) = ( -3.93785648377292E-01, -3.11918891341870E-01)
-
-PATH NUMBER =      4144
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.53394025662622E-01,  3.57958888548384E-01)
-X( 2) = ( -3.12964601232537E-01,  9.75615665898683E-01)
-X( 3) = (  5.64937527053557E-01, -1.84698022043304E+00)
-X( 4) = ( -9.52093022011090E-01,  8.72208218305277E-01)
-
-X( 5) = ( -5.42678937977799E-01, -3.40069275744856E-01)
-
-PATH NUMBER =      4145
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.25159597035188E-01,  3.02149623190780E-01)
-X( 2) = ( -6.52160476371283E-01,  7.55458540104987E-01)
-X( 3) = (  6.38620852873948E-01, -1.51383867898365E+00)
-X( 4) = ( -1.03997156556207E+00,  8.64717599781237E-01)
-
-X( 5) = ( -7.19416329642027E-01, -5.47823096035840E-01)
-
-PATH NUMBER =      4146
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.09590941222386E-01,  4.84122217947810E-02)
-X( 2) = ( -7.70485319005811E-01,  3.68777491481711E-01)
-X( 3) = (  4.80926300053640E-01, -1.21127472350640E+00)
-X( 4) = ( -1.10247555874254E+00,  8.02492214133507E-01)
-
-X( 5) = ( -4.94471003472665E-01, -9.40509802506246E-01)
-
-PATH NUMBER =      4147
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.07555028057769E-01, -2.84526765549326E-01)
-X( 2) = ( -6.12573620233277E-01, -3.49511983915235E-03)
-X( 3) = (  1.65640902436991E-01, -1.08086139139292E+00)
-X( 4) = ( -1.11035868848886E+00,  7.14648010864787E-01)
-
-X( 5) = ( -1.28927155977208E-01, -7.84000359881461E-01)
-
-PATH NUMBER =      4148
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.20004483937718E-01, -5.40881486458552E-01)
-X( 2) = ( -2.52314018902396E-01, -1.87168801671353E-01)
-X( 3) = ( -1.59709798424284E-01, -1.18362053012183E+00)
-X( 4) = ( -1.05993235078149E+00,  6.42288268964086E-01)
-
-X( 5) = ( -9.62911509881431E-02, -5.70106645393054E-01)
-
-PATH NUMBER =      4149
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.47531847343304E-01, -6.00700717954103E-01)
-X( 2) = (  1.41724013684630E-01, -9.63005969800116E-02)
-X( 3) = ( -3.42890593726925E-01, -1.47146999664126E+00)
-X( 4) = ( -9.74791589460038E-01,  6.19270915855694E-01)
-
-X( 5) = ( -1.46135092497220E-01, -4.51009418244519E-01)
-
-PATH NUMBER =      4150
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06100790738254E+00, -1.95530673216366E-01)
-X( 2) = (  4.97571615197870E-01,  2.99275276815231E-01)
-X( 3) = ( -6.85414042989829E-02, -1.76064604844216E+00)
-X( 4) = ( -8.81103553349234E-01,  3.07802928605799E-01)
-
-X( 5) = ( -3.78637145500210E-01, -4.12225517477351E-01)
-
-PATH NUMBER =      4151
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17679288013002E+00,  1.16633313050464E-01)
-X( 2) = (  4.76507889005736E-01,  7.03106084441128E-01)
-X( 3) = (  1.83125970741901E-01, -1.99102845116264E+00)
-X( 4) = ( -8.43651347505624E-01,  3.87653289030541E-01)
-
-X( 5) = ( -4.50356649087268E-01, -2.90496700746062E-01)
-
-PATH NUMBER =      4152
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06483417253724E+00,  4.30189945942015E-01)
-X( 2) = (  2.00794699053235E-01,  9.98918928373062E-01)
-X( 3) = (  5.24001318864850E-01, -2.00574294012044E+00)
-X( 4) = ( -8.66288115646606E-01,  4.72896027786664E-01)
-
-X( 5) = ( -5.46582190856101E-01, -1.81524034304145E-01)
-
-PATH NUMBER =      4153
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.77518508169286E-01,  5.98422592134525E-01)
-X( 2) = ( -2.00558688870068E-01,  1.04829969134172E+00)
-X( 3) = (  7.94585276275628E-01, -1.79790444239889E+00)
-X( 4) = ( -9.38421862379361E-01,  5.23645120042665E-01)
-
-X( 5) = ( -7.02001096317168E-01, -6.98664878829584E-02)
-
-PATH NUMBER =      4154
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.49284079541852E-01,  5.42613326776922E-01)
-X( 2) = ( -5.39754564008815E-01,  8.28142565548028E-01)
-X( 3) = (  8.68268602096020E-01, -1.46476290094950E+00)
-X( 4) = ( -1.02630040593034E+00,  5.16154501518625E-01)
-
-X( 5) = ( -1.03348690560431E+00,  2.00618882369243E-02)
-
-PATH NUMBER =      4155
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.33715423729049E-01,  2.88875925380922E-01)
-X( 2) = ( -6.58079406643342E-01,  4.41461516924752E-01)
-X( 3) = (  7.10574049275713E-01, -1.16219894547226E+00)
-X( 4) = ( -1.08880439911081E+00,  4.53929115870894E-01)
-
-X( 5) = ( -1.77006235313969E+00, -4.86011556941812E-01)
-
-PATH NUMBER =      4156
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.31679510564433E-01, -4.40630619631846E-02)
-X( 2) = ( -5.00167707870809E-01,  6.91889056038885E-02)
-X( 3) = (  3.95288651659064E-01, -1.03178561335877E+00)
-X( 4) = ( -1.09668752885713E+00,  3.66084912602175E-01)
-
-X( 5) = ( -7.45773270043326E-01, -1.41460060508347E+00)
-
-PATH NUMBER =      4157
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.44128966444381E-01, -3.00417782872411E-01)
-X( 2) = ( -1.39908106539928E-01, -1.14484776228312E-01)
-X( 3) = (  6.99379507977883E-02, -1.13454475208769E+00)
-X( 4) = ( -1.04626119114976E+00,  2.93725170701474E-01)
-
-X( 5) = ( -3.19650445578144E-01, -8.65577875512400E-01)
-
-PATH NUMBER =      4158
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.71656329849967E-01, -3.60237014367962E-01)
-X( 2) = (  2.54129926047098E-01, -2.36165715369709E-02)
-X( 3) = ( -1.13242844504852E-01, -1.42239421860712E+00)
-X( 4) = ( -9.61120429828309E-01,  2.70707817593081E-01)
-
-X( 5) = ( -3.23398787889003E-01, -5.77824657832387E-01)
-
-PATH NUMBER =      4159
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.71712355281584E-01, -1.24375392804318E-01)
-X( 2) = (  5.36959148759930E-01,  4.27207598331496E-01)
-X( 3) = (  7.58336758112908E-02, -1.57543709359501E+00)
-X( 4) = ( -6.46578796725197E-01,  4.95757561267128E-02)
-
-X( 5) = ( -6.77436551640282E-01, -5.95430694868947E-01)
-
-PATH NUMBER =      4160
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.87497328029069E-01,  1.87788593462511E-01)
-X( 2) = (  5.15895422567795E-01,  8.31038405957394E-01)
-X( 3) = (  3.27501050852175E-01, -1.80581949631549E+00)
-X( 4) = ( -6.09126590881586E-01,  1.29426116551454E-01)
-
-X( 5) = ( -7.43129609726363E-01, -2.66550213595339E-01)
-
-PATH NUMBER =      4161
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.75538620436286E-01,  5.01345226354062E-01)
-X( 2) = (  2.40182232615296E-01,  1.12685124988933E+00)
-X( 3) = (  6.68376398975123E-01, -1.82053398527330E+00)
-X( 4) = ( -6.31763359022569E-01,  2.14668855307578E-01)
-
-X( 5) = ( -7.85495791827905E-01,  2.25682193026918E-02)
-
-PATH NUMBER =      4162
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.88222956068332E-01,  6.69577872546573E-01)
-X( 2) = ( -1.61171155308008E-01,  1.17623201285799E+00)
-X( 3) = (  9.38960356385903E-01, -1.61269548755174E+00)
-X( 4) = ( -7.03897105755324E-01,  2.65417947563579E-01)
-
-X( 5) = ( -8.16483203228626E-01,  3.49879894580890E-01)
-
-PATH NUMBER =      4163
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.59988527440898E-01,  6.13768607188970E-01)
-X( 2) = ( -5.00367030446756E-01,  9.56074887064293E-01)
-X( 3) = (  1.01264368220629E+00, -1.27955394610235E+00)
-X( 4) = ( -7.91775649306300E-01,  2.57927329039538E-01)
-
-X( 5) = ( -8.29633557658155E-01,  8.45220349520472E-01)
-
-PATH NUMBER =      4164
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.55801283719044E-02,  3.60031205792970E-01)
-X( 2) = ( -6.18691873081282E-01,  5.69393838441017E-01)
-X( 3) = (  8.54949129385987E-01, -9.76989990625111E-01)
-X( 4) = ( -8.54279642486771E-01,  1.95701943391807E-01)
-
-X( 5) = ( -6.93823655737723E-01,  2.03895900208388E+00)
-
-PATH NUMBER =      4165
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.76160415365209E-02,  2.70922184488631E-02)
-X( 2) = ( -4.60780174308749E-01,  1.97121227120154E-01)
-X( 3) = (  5.39663731769338E-01, -8.46576658511626E-01)
-X( 4) = ( -8.62162772233090E-01,  1.07857740123088E-01)
-
-X( 5) = (  1.04938301439195E+01,  3.81959172282509E+00)
-
-PATH NUMBER =      4166
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.54833414343427E-01, -2.29262502460363E-01)
-X( 2) = ( -1.00520572977868E-01,  1.34475452879529E-02)
-X( 3) = (  2.14313030908062E-01, -9.49335797240537E-01)
-X( 4) = ( -8.11736434525726E-01,  3.54979982223870E-02)
-
-X( 5) = (  1.78303432939629E-03, -2.31024037670157E+00)
-
-PATH NUMBER =      4167
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.82360777749013E-01, -2.89081733955914E-01)
-X( 2) = (  2.93517459609158E-01,  1.04315749979295E-01)
-X( 3) = (  3.11322356054214E-02, -1.23718526375997E+00)
-X( 4) = ( -7.26595673204271E-01,  1.24806451139943E-02)
-
-X( 5) = ( -5.40233552663331E-01, -1.09606972463112E+00)
-
-PATH NUMBER =      4168
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.04361372562976E-01, -2.55822882074016E-01)
-X( 2) = (  4.84898438824217E-01,  5.50527260874146E-01)
-X( 3) = (  6.73813822758831E-02, -1.34075629027609E+00)
-X( 4) = ( -3.00937183185576E-01,  2.51187330946518E-03)
-
-X( 5) = ( -5.54867377279189E-01, -1.72116286515482E+00)
-
-PATH NUMBER =      4169
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.20146345310462E-01,  5.63411041928132E-02)
-X( 2) = (  4.63834712632083E-01,  9.54358068500044E-01)
-X( 3) = (  3.19048757316767E-01, -1.57113869299657E+00)
-X( 4) = ( -2.63484977341966E-01,  8.23622337342070E-02)
-
-X( 5) = ( -1.60701292062934E+00, -6.74143703107480E-01)
-
-PATH NUMBER =      4170
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.08187637717678E-01,  3.69897737084364E-01)
-X( 2) = (  1.88121522679584E-01,  1.25017091243198E+00)
-X( 3) = (  6.59924105439716E-01, -1.58585318195438E+00)
-X( 4) = ( -2.86121745482949E-01,  1.67604972490331E-01)
-
-X( 5) = ( -1.41790641410666E+00,  5.64021843653293E-01)
-
-PATH NUMBER =      4171
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.20871973349724E-01,  5.38130383276875E-01)
-X( 2) = ( -2.13231865243720E-01,  1.29955167540064E+00)
-X( 3) = (  9.30508062850495E-01, -1.37801468423283E+00)
-X( 4) = ( -3.58255492215704E-01,  2.18354064746331E-01)
-
-X( 5) = ( -6.64321580188879E-01,  1.16027265900732E+00)
-
-PATH NUMBER =      4172
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07362455277710E-01,  4.82321117919272E-01)
-X( 2) = ( -5.52427740382468E-01,  1.07939454960694E+00)
-X( 3) = (  1.00419138867089E+00, -1.04487314278344E+00)
-X( 4) = ( -4.46134035766679E-01,  2.10863446222290E-01)
-
-X( 5) = (  1.08837124236106E-01,  1.22760461620611E+00)
-
-PATH NUMBER =      4173
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.22931111090513E-01,  2.28583716523272E-01)
-X( 2) = ( -6.70752583016994E-01,  6.92713500983668E-01)
-X( 3) = (  8.46496835850579E-01, -7.42309187306195E-01)
-X( 4) = ( -5.08638028947151E-01,  1.48638060574560E-01)
-
-X( 5) = (  7.55171945829949E-01,  9.48800875830594E-01)
-
-PATH NUMBER =      4174
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.24967024255129E-01, -1.04355270820835E-01)
-X( 2) = ( -5.12840884244461E-01,  3.20440889662804E-01)
-X( 3) = (  5.31211438233930E-01, -6.11895855192709E-01)
-X( 4) = ( -5.16521158693470E-01,  6.07938573058405E-02)
-
-X( 5) = (  1.21656835712000E+00,  3.84701155763245E-01)
-
-PATH NUMBER =      4175
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12517568375181E-01, -3.60709991730061E-01)
-X( 2) = ( -1.52581282913580E-01,  1.36767207830603E-01)
-X( 3) = (  2.05860737372654E-01, -7.14654993921620E-01)
-X( 4) = ( -4.66094820986105E-01, -1.15658845948609E-02)
-
-X( 5) = (  1.34908106423099E+00, -4.61964960485812E-01)
-
-PATH NUMBER =      4176
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.15009795030405E-01, -4.20529223225612E-01)
-X( 2) = (  2.41456749673446E-01,  2.27635412521945E-01)
-X( 3) = (  2.26799420700138E-02, -1.00250446044105E+00)
-X( 4) = ( -3.80954059664650E-01, -3.45832377032533E-02)
-
-X( 5) = (  8.14478130513898E-01, -1.42814840980275E+00)
-
-PATH NUMBER =      4177
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.84051455315954E-01, -5.28367399920051E-01)
-X( 2) = (  3.65749270159995E-01,  6.11531623794091E-01)
-X( 3) = ( -8.99433628232095E-02, -1.16641339454493E+00)
-X( 4) = ( -5.90826508420632E-03,  1.88632993981041E-01)
-
-X( 5) = (  5.51337465041904E-01, -9.31566374195200E-01)
-
-PATH NUMBER =      4178
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.99836428063440E-01, -2.16203413653222E-01)
-X( 2) = (  3.44685543967861E-01,  1.01536243141999E+00)
-X( 3) = (  1.61724012217674E-01, -1.39679579726541E+00)
-X( 4) = (  3.15439407594041E-02,  2.68483354405783E-01)
-
-X( 5) = (  4.38696202625386E-01, -1.93876187302364E+00)
-
-PATH NUMBER =      4179
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.87877720470656E-01,  9.73532192383291E-02)
-X( 2) = (  6.89723540153622E-02,  1.31117527535192E+00)
-X( 3) = (  5.02599360340622E-01, -1.41151028622322E+00)
-X( 4) = (  8.90717261842148E-03,  3.53726093161906E-01)
-
-X( 5) = (  1.86286274672695E+01, -1.57740789782348E+01)
-
-PATH NUMBER =      4180
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00562056102702E-01,  2.65585865430840E-01)
-X( 2) = ( -3.32381033907943E-01,  1.36055603832058E+00)
-X( 3) = (  7.73183317751402E-01, -1.20367178850167E+00)
-X( 4) = ( -6.32265741143337E-02,  4.04475185417907E-01)
-
-X( 5) = (  1.23858540118621E+00,  1.75446980936388E+00)
-
-PATH NUMBER =      4181
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.27672372524731E-01,  2.09776600073237E-01)
-X( 2) = ( -6.71576909046690E-01,  1.14039891252689E+00)
-X( 3) = (  8.46866643571794E-01, -8.70530247052275E-01)
-X( 4) = ( -1.51105117665309E-01,  3.96984566893867E-01)
-
-X( 5) = (  8.92219803832334E-01,  6.76276614285462E-01)
-
-PATH NUMBER =      4182
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.43241028337534E-01, -4.39608013227630E-02)
-X( 2) = ( -7.89901751681216E-01,  7.53717863903612E-01)
-X( 3) = (  6.89172090751486E-01, -5.67966291575034E-01)
-X( 4) = ( -2.13609110845781E-01,  3.34759181246136E-01)
-
-X( 5) = (  7.83325762106138E-01,  2.55646223323854E-01)
-
-PATH NUMBER =      4183
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.45276941502151E-01, -3.76899788666870E-01)
-X( 2) = ( -6.31990052908683E-01,  3.81445252582749E-01)
-X( 3) = (  3.73886693134837E-01, -4.37552959461549E-01)
-X( 4) = ( -2.21492240592100E-01,  2.46914977977417E-01)
-
-X( 5) = (  7.20358519990242E-01, -1.68181419007762E-02)
-
-PATH NUMBER =      4184
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.32827485622202E-01, -6.33254509576096E-01)
-X( 2) = ( -2.71730451577802E-01,  1.97771570750548E-01)
-X( 3) = (  4.85359922735614E-02, -5.40312098190460E-01)
-X( 4) = ( -1.71065902884735E-01,  1.74555236076715E-01)
-
-X( 5) = (  6.70128610499534E-01, -2.54903975032861E-01)
-
-PATH NUMBER =      4185
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.46998777833836E-02, -6.93073741071647E-01)
-X( 2) = (  1.22307581009224E-01,  2.88639775441889E-01)
-X( 3) = ( -1.34644803029079E-01, -8.28161564709894E-01)
-X( 4) = ( -8.59251415632805E-02,  1.51537882968322E-01)
-
-X( 5) = (  6.18710483822770E-01, -5.23782490806590E-01)
-
-PATH NUMBER =      4186
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.67076950916193E-01, -8.14482337447345E-01)
-X( 2) = (  2.35262862980761E-01,  5.81676067693114E-01)
-X( 3) = ( -3.22526562784341E-01, -1.13398538491960E+00)
-X( 4) = (  1.00460647918090E-01,  5.20850977273363E-01)
-
-X( 5) = (  3.01310186155717E-01, -5.39895036997704E-01)
-
-PATH NUMBER =      4187
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.82861923663678E-01, -5.02318351180516E-01)
-X( 2) = (  2.14199136788627E-01,  9.85506875319011E-01)
-X( 3) = ( -7.08591877434571E-02, -1.36436778764008E+00)
-X( 4) = (  1.37912853761700E-01,  6.00701337698105E-01)
-
-X( 5) = (  3.03742925664385E-01, -7.85000188331315E-01)
-
-PATH NUMBER =      4188
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.70903216070894E-01, -1.88761718288965E-01)
-X( 2) = ( -6.15140531638716E-02,  1.28131971925095E+00)
-X( 3) = (  2.70016160379491E-01, -1.37908227659788E+00)
-X( 4) = (  1.15276085620718E-01,  6.85944076454228E-01)
-
-X( 5) = (  6.50736008312061E-01, -1.20055678997640E+00)
-
-PATH NUMBER =      4189
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.83587551702940E-01, -2.05290720964544E-02)
-X( 2) = ( -4.62867441087177E-01,  1.33070048221961E+00)
-X( 3) = (  5.40600117790271E-01, -1.17124377887633E+00)
-X( 4) = (  4.31423388879625E-02,  7.36693168710229E-01)
-
-X( 5) = (  1.46628197452569E+00, -5.92616871584882E-01)
-
-PATH NUMBER =      4190
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.44646876924493E-01, -7.63383374540578E-02)
-X( 2) = ( -8.02063316225924E-01,  1.11054335642591E+00)
-X( 3) = (  6.14283443610662E-01, -8.38102237426938E-01)
-X( 4) = ( -4.47362046630126E-02,  7.29202550186189E-01)
-
-X( 5) = (  9.65804342725710E-01, -7.29626617173725E-02)
-
-PATH NUMBER =      4191
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.60215532737296E-01, -3.30075738850057E-01)
-X( 2) = ( -9.20388158860450E-01,  7.23862307802636E-01)
-X( 3) = (  4.56588890790354E-01, -5.35538281949697E-01)
-X( 4) = ( -1.07240197843484E-01,  6.66977164538458E-01)
-
-X( 5) = (  6.61889875422591E-01, -1.08318694928708E-01)
-
-PATH NUMBER =      4192
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.62251445901912E-01, -6.63014726194164E-01)
-X( 2) = ( -7.62476460087918E-01,  3.51589696481772E-01)
-X( 3) = (  1.41303493173705E-01, -4.05124949836212E-01)
-X( 4) = ( -1.15123327589804E-01,  5.79132961269739E-01)
-
-X( 5) = (  5.12110473813809E-01, -1.95133196826212E-01)
-
-PATH NUMBER =      4193
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.49801990021964E-01, -9.19369447103391E-01)
-X( 2) = ( -4.02216858757036E-01,  1.67916014649571E-01)
-X( 3) = ( -1.84047207687570E-01, -5.07884088565123E-01)
-X( 4) = ( -6.46969898824390E-02,  5.06773219369038E-01)
-
-X( 5) = (  4.19172786015432E-01, -2.87804639868469E-01)
-
-PATH NUMBER =      4194
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.77725373383622E-01, -9.79188678598942E-01)
-X( 2) = ( -8.17882617001038E-03,  2.58784219340913E-01)
-X( 3) = ( -3.67228002990211E-01, -7.95733555084557E-01)
-X( 4) = (  2.04437714390156E-02,  4.83755866260645E-01)
-
-X( 5) = (  3.51138248581120E-01, -3.94411346418028E-01)
-
-PATH NUMBER =      4195
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.14589307246737E-01, -9.80291335573546E-01)
-X( 2) = (  1.54495257400558E-01,  4.74930339078410E-01)
-X( 3) = ( -5.21539953471360E-01, -1.25864568750096E+00)
-X( 4) = ( -3.16016407312492E-02,  8.43717336612343E-01)
-
-X( 5) = (  1.33111147784771E-01, -4.38159956820891E-01)
-
-PATH NUMBER =      4196
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.30374279994222E-01, -6.68127349306717E-01)
-X( 2) = (  1.33431531208423E-01,  8.78761146704307E-01)
-X( 3) = ( -2.69872578430475E-01, -1.48902809022144E+00)
-X( 4) = (  5.85056511236088E-03,  9.23567697037085E-01)
-
-X( 5) = (  8.43795126899440E-02, -5.47177837018416E-01)
-
-PATH NUMBER =      4197
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.18415572401439E-01, -3.54570716415166E-01)
-X( 2) = ( -1.42281658744076E-01,  1.17457399063624E+00)
-X( 3) = (  7.10027696924723E-02, -1.50374257917925E+00)
-X( 4) = ( -1.67862030286212E-02,  1.00881043579321E+00)
-
-X( 5) = (  1.09653503620403E-01, -7.40822184697962E-01)
-
-PATH NUMBER =      4198
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.31099908033486E-01, -1.86338070222656E-01)
-X( 2) = ( -5.43635046667381E-01,  1.22395475360490E+00)
-X( 3) = (  3.41586727103252E-01, -1.29590408145769E+00)
-X( 4) = ( -8.89199497613773E-02,  1.05955952804921E+00)
-
-X( 5) = (  4.23150188562443E-01, -8.93678417903516E-01)
-
-PATH NUMBER =      4199
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02865479406052E-01, -2.42147335580259E-01)
-X( 2) = ( -8.82830921806127E-01,  1.00379762781121E+00)
-X( 3) = (  4.15270052923643E-01, -9.62762540008303E-01)
-X( 4) = ( -1.76798493312352E-01,  1.05206890952517E+00)
-
-X( 5) = (  6.55075069321900E-01, -5.64450239480773E-01)
-
-PATH NUMBER =      4200
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.12703176406751E-01, -4.95884736976258E-01)
-X( 2) = ( -1.00115576444065E+00,  6.17116579187931E-01)
-X( 3) = (  2.57575500103336E-01, -6.60198584531062E-01)
-X( 4) = ( -2.39302486492824E-01,  9.89843523877438E-01)
-
-X( 5) = (  5.10919010826451E-01, -3.55831492047568E-01)
-
-PATH NUMBER =      4201
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.14739089571367E-01, -8.28823724320365E-01)
-X( 2) = ( -8.43244065668121E-01,  2.44843967867067E-01)
-X( 3) = ( -5.77098975133125E-02, -5.29785252417577E-01)
-X( 4) = ( -2.47185616239143E-01,  9.01999320608718E-01)
-
-X( 5) = (  3.72266437815197E-01, -3.18319803151464E-01)
-
-PATH NUMBER =      4202
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.77103663085808E-02, -1.08517844522959E+00)
-X( 2) = ( -4.82984464337240E-01,  6.11702860348662E-02)
-X( 3) = ( -3.83060598374588E-01, -6.32544391146488E-01)
-X( 4) = ( -1.96759278531778E-01,  8.29639578708017E-01)
-
-X( 5) = (  2.73863546066879E-01, -3.34020030011072E-01)
-
-PATH NUMBER =      4203
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.25237729714166E-01, -1.14499767672514E+00)
-X( 2) = ( -8.89464317502143E-02,  1.52038490726208E-01)
-X( 3) = ( -5.66241393677229E-01, -9.20393857665921E-01)
-X( 4) = ( -1.11618517210324E-01,  8.06622225599624E-01)
-
-X( 5) = (  1.97561461832480E-01, -3.73678723110207E-01)
-
-PATH NUMBER =      4204
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01077474198710E+00, -9.48210521313652E-01)
-X( 2) = (  1.61238513702312E-01,  3.41241950715424E-01)
-X( 3) = ( -5.93862957594339E-01, -1.48206436126627E+00)
-X( 4) = ( -3.40301718464348E-01,  1.00615931420338E+00)
-
-X( 5) = (  1.30036293181666E-02, -3.98061003220597E-01)
-
-PATH NUMBER =      4205
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12655971473458E+00, -6.36046535046823E-01)
-X( 2) = (  1.40174787510177E-01,  7.45072758341321E-01)
-X( 3) = ( -3.42195582553455E-01, -1.71244676398675E+00)
-X( 4) = ( -3.02849512620738E-01,  1.08600967462812E+00)
-
-X( 5) = ( -5.61769511849964E-02, -4.46409350907074E-01)
-
-PATH NUMBER =      4206
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01460100714180E+00, -3.22489902155272E-01)
-X( 2) = ( -1.35538402442322E-01,  1.04088560227326E+00)
-X( 3) = ( -1.32023443050605E-03, -1.72716125294455E+00)
-X( 4) = ( -3.25486280761721E-01,  1.17125241338424E+00)
-
-X( 5) = ( -1.13107473609680E-01, -5.51178993859420E-01)
-
-PATH NUMBER =      4207
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.27285342773843E-01, -1.54257255962762E-01)
-X( 2) = ( -5.36891790365626E-01,  1.09026636524192E+00)
-X( 3) = (  2.69263722980273E-01, -1.51932275522300E+00)
-X( 4) = ( -3.97620027494476E-01,  1.22200150564024E+00)
-
-X( 5) = ( -6.68736828278026E-02, -7.43547799114338E-01)
-
-PATH NUMBER =      4208
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.99050914146410E-01, -2.10066521320365E-01)
-X( 2) = ( -8.76087665504373E-01,  8.70109239448221E-01)
-X( 3) = (  3.42947048800664E-01, -1.18618121377361E+00)
-X( 4) = ( -4.85498571045451E-01,  1.21451088711620E+00)
-
-X( 5) = (  2.17708075873325E-01, -7.91191814304566E-01)
-
-PATH NUMBER =      4209
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.83482258333607E-01, -4.63803922716364E-01)
-X( 2) = ( -9.94412508138901E-01,  4.83428190824945E-01)
-X( 3) = (  1.85252495980357E-01, -8.83617258296368E-01)
-X( 4) = ( -5.48002564225923E-01,  1.15228550146847E+00)
-
-X( 5) = (  3.22091973029968E-01, -5.63192216161209E-01)
-
-PATH NUMBER =      4210
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.81446345168991E-01, -7.96742910060471E-01)
-X( 2) = ( -8.36500809366367E-01,  1.11155579504082E-01)
-X( 3) = ( -1.30032901636292E-01, -7.53203926182883E-01)
-X( 4) = ( -5.55885693972243E-01,  1.06444129819975E+00)
-
-X( 5) = (  2.46676811567208E-01, -4.31388764665949E-01)
-
-PATH NUMBER =      4211
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.93895801048939E-01, -1.05309763096970E+00)
-X( 2) = ( -4.76241208035486E-01, -7.25181023281190E-02)
-X( 3) = ( -4.55383602497568E-01, -8.55963064911794E-01)
-X( 4) = ( -5.05459356264878E-01,  9.92081556299053E-01)
-
-X( 5) = (  1.59893285897860E-01, -3.86214924642998E-01)
-
-PATH NUMBER =      4212
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.21423164454525E-01, -1.11291686246525E+00)
-X( 2) = ( -8.22031754484602E-02,  1.83501023632226E-02)
-X( 3) = ( -6.38564397800209E-01, -1.14381253143123E+00)
-X( 4) = ( -4.20318594943423E-01,  9.69064203190661E-01)
-
-X( 5) = (  8.36105462137522E-02, -3.79750935295244E-01)
-
-PATH NUMBER =      4213
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24200798335565E+00, -6.73566006252143E-01)
-X( 2) = (  3.41422531858204E-01, -4.19296339123345E-02)
-X( 3) = ( -1.72941024669122E-01, -1.28920267947524E+00)
-X( 4) = ( -8.13352687367893E-01,  7.05711192750270E-01)
-
-X( 5) = ( -2.43789865215540E-01, -3.44711267402732E-01)
-
-PATH NUMBER =      4214
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.35779295610314E+00, -3.61402019985314E-01)
-X( 2) = (  3.20358805666070E-01,  3.61901173713563E-01)
-X( 3) = (  7.87263503717627E-02, -1.51958508219572E+00)
-X( 4) = ( -7.75900481524283E-01,  7.85561553175012E-01)
-
-X( 5) = ( -3.06335237948576E-01, -2.89013694839811E-01)
-
-PATH NUMBER =      4215
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24583424851035E+00, -4.78453870937631E-02)
-X( 2) = (  4.46456157135704E-02,  6.57714017645497E-01)
-X( 3) = (  4.19601698494711E-01, -1.53429957115352E+00)
-X( 4) = ( -7.98537249665266E-01,  8.70804291931136E-01)
-
-X( 5) = ( -3.90881383310442E-01, -2.52078946039644E-01)
-
-PATH NUMBER =      4216
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.58518584142399E-01,  1.20387259098747E-01)
-X( 2) = ( -3.56707772209734E-01,  7.07094780614159E-01)
-X( 3) = (  6.90185655905491E-01, -1.32646107343197E+00)
-X( 4) = ( -8.70670996398021E-01,  9.21553384187136E-01)
-
-X( 5) = ( -5.16527705379341E-01, -2.49570866885446E-01)
-
-PATH NUMBER =      4217
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.30284155514966E-01,  6.45779937411439E-02)
-X( 2) = ( -6.95903647348480E-01,  4.86937654820462E-01)
-X( 3) = (  7.63868981725882E-01, -9.93319531982578E-01)
-X( 4) = ( -9.58549539948996E-01,  9.14062765663096E-01)
-
-X( 5) = ( -6.92000021435084E-01, -3.68163748550187E-01)
-
-PATH NUMBER =      4218
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14715499702163E-01, -1.89159407654856E-01)
-X( 2) = ( -8.14228489983008E-01,  1.00256606197187E-01)
-X( 3) = (  6.06174428905574E-01, -6.90755576505337E-01)
-X( 4) = ( -1.02105353312947E+00,  8.51837380015365E-01)
-
-X( 5) = ( -6.52175641047832E-01, -7.26350358776468E-01)
-
-PATH NUMBER =      4219
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.12679586537546E-01, -5.22098394998962E-01)
-X( 2) = ( -6.56316791210474E-01, -2.72016005123677E-01)
-X( 3) = (  2.90889031288925E-01, -5.60342244391852E-01)
-X( 4) = ( -1.02893666287579E+00,  7.63993176746646E-01)
-
-X( 5) = ( -2.86195957713288E-01, -7.43721531545551E-01)
-
-PATH NUMBER =      4220
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.25129042417495E-01, -7.78453115908189E-01)
-X( 2) = ( -2.96057189879593E-01, -4.55689686955878E-01)
-X( 3) = ( -3.44616695723505E-02, -6.63101383120763E-01)
-X( 4) = ( -9.78510325168422E-01,  6.91633434845945E-01)
-
-X( 5) = ( -1.80709930431283E-01, -5.52666130025240E-01)
-
-PATH NUMBER =      4221
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.52656405823081E-01, -8.38272347403740E-01)
-X( 2) = (  9.79808427074325E-02, -3.64821482264536E-01)
-X( 3) = ( -2.17642464874991E-01, -9.50950849640197E-01)
-X( 4) = ( -8.93369563846968E-01,  6.68616081737552E-01)
-
-X( 5) = ( -1.97001899679117E-01, -4.25331553778125E-01)
-
-PATH NUMBER =      4222
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26184660974371E+00, -3.76309518856246E-01)
-X( 2) = (  4.74250847374120E-01, -5.85035678402803E-02)
-X( 3) = (  3.45246595533034E-02, -1.39922318021279E+00)
-X( 4) = ( -1.02693201225817E+00,  4.29908716228540E-01)
-
-X( 5) = ( -3.31524319295080E-01, -2.58242486589120E-01)
-
-PATH NUMBER =      4223
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.37763158249120E+00, -6.41455325894167E-02)
-X( 2) = (  4.53187121181986E-01,  3.45327239785617E-01)
-X( 3) = (  2.86192034594187E-01, -1.62960558293327E+00)
-X( 4) = ( -9.89479806414563E-01,  5.09759076653281E-01)
-
-X( 5) = ( -3.52575042889671E-01, -1.82531534516652E-01)
-
-PATH NUMBER =      4224
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26567287489842E+00,  2.49411100302135E-01)
-X( 2) = (  1.77473931229486E-01,  6.41140083717551E-01)
-X( 3) = (  6.27067382717137E-01, -1.64432007189108E+00)
-X( 4) = ( -1.01211657455555E+00,  5.95001815409405E-01)
-
-X( 5) = ( -3.96145490508517E-01, -1.18645383143006E-01)
-
-PATH NUMBER =      4225
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.78357210530462E-01,  4.17643746494645E-01)
-X( 2) = ( -2.23879456693818E-01,  6.90520846686213E-01)
-X( 3) = (  8.97651340127915E-01, -1.43648157416952E+00)
-X( 4) = ( -1.08425032128830E+00,  6.45750907665405E-01)
-
-X( 5) = ( -4.71953959405605E-01, -6.51289736394751E-02)
-
-PATH NUMBER =      4226
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.50122781903029E-01,  3.61834481137042E-01)
-X( 2) = ( -5.63075331832565E-01,  4.70363720892517E-01)
-X( 3) = (  9.71334665948307E-01, -1.10334003272013E+00)
-X( 4) = ( -1.17212886483928E+00,  6.38260289141365E-01)
-
-X( 5) = ( -6.07555519459517E-01, -4.74528397789040E-02)
-
-PATH NUMBER =      4227
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.34554126090226E-01,  1.08097079741042E-01)
-X( 2) = ( -6.81400174467092E-01,  8.36826722692403E-02)
-X( 3) = (  8.13640113127999E-01, -8.00776077242889E-01)
-X( 4) = ( -1.23463285801975E+00,  5.76034903493634E-01)
-
-X( 5) = ( -7.90581606432761E-01, -1.92533711503618E-01)
-
-PATH NUMBER =      4228
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.32518212925609E-01, -2.24841907603064E-01)
-X( 2) = ( -5.23488475694559E-01, -2.88589939051622E-01)
-X( 3) = (  4.98354715511350E-01, -6.70362745129404E-01)
-X( 4) = ( -1.24251598776607E+00,  4.88190700224915E-01)
-
-X( 5) = ( -6.80191606236552E-01, -4.95590985397170E-01)
-
-PATH NUMBER =      4229
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.44967668805557E-01, -4.81196628512291E-01)
-X( 2) = ( -1.63228874363678E-01, -4.72263620883824E-01)
-X( 3) = (  1.73004014650075E-01, -7.73121883858315E-01)
-X( 4) = ( -1.19208965005870E+00,  4.15830958324214E-01)
-
-X( 5) = ( -4.27355021390709E-01, -4.76073676179396E-01)
-
-PATH NUMBER =      4230
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.72495032211143E-01, -5.41015860007842E-01)
-X( 2) = (  2.30809158223348E-01, -3.81395416192482E-01)
-X( 3) = ( -1.01767806525659E-02, -1.06097135037775E+00)
-X( 4) = ( -1.10694888873725E+00,  3.92813605215821E-01)
-
-X( 5) = ( -3.41162499407764E-01, -3.55253992207184E-01)
-
-PATH NUMBER =      4231
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08597109225038E+00, -1.35845815270104E-01)
-X( 2) = (  5.86656759736588E-01,  1.41804576027607E-02)
-X( 3) = (  2.64172408775377E-01, -1.35014740217864E+00)
-X( 4) = ( -1.01326085262644E+00,  8.13456179659264E-02)
-
-X( 5) = ( -4.40671535099244E-01, -1.73507973412256E-01)
-
-PATH NUMBER =      4232
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.20175606499786E+00,  1.76318170996726E-01)
-X( 2) = (  5.65593033544454E-01,  4.18011265228658E-01)
-X( 3) = (  5.15839783816261E-01, -1.58052980489912E+00)
-X( 4) = ( -9.75808646782835E-01,  1.61195978390668E-01)
-
-X( 5) = ( -4.13410394827397E-01, -8.34660745222306E-02)
-
-PATH NUMBER =      4233
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08979735740508E+00,  4.89874803888277E-01)
-X( 2) = (  2.89879843591954E-01,  7.13824109160592E-01)
-X( 3) = (  8.56715131939209E-01, -1.59524429385693E+00)
-X( 4) = ( -9.98445414923817E-01,  2.46438717146791E-01)
-
-X( 5) = ( -4.15983852186672E-01, -8.72800077505083E-04)
-
-PATH NUMBER =      4234
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.02481693037125E-01,  6.58107450080787E-01)
-X( 2) = ( -1.11473544331350E-01,  7.63204872129254E-01)
-X( 3) = (  1.12729908934999E+00, -1.38740579613538E+00)
-X( 4) = ( -1.07057916165657E+00,  2.97187809402792E-01)
-
-X( 5) = ( -4.46195117929093E-01,  8.27503714470298E-02)
-
-PATH NUMBER =      4235
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.74247264409691E-01,  6.02298184723183E-01)
-X( 2) = ( -4.50669419470097E-01,  5.43047746335558E-01)
-X( 3) = (  1.20098241517038E+00, -1.05426425468598E+00)
-X( 4) = ( -1.15845770520755E+00,  2.89697190878752E-01)
-
-X( 5) = ( -5.24668570233306E-01,  1.70788109990947E-01)
-
-PATH NUMBER =      4236
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.58678608596888E-01,  3.48560783327184E-01)
-X( 2) = ( -5.68994262104624E-01,  1.56366697712281E-01)
-X( 3) = (  1.04328786235007E+00, -7.51700299208743E-01)
-X( 4) = ( -1.22096169838802E+00,  2.27471805231021E-01)
-
-X( 5) = ( -7.11716022656501E-01,  2.21022693518021E-01)
-
-PATH NUMBER =      4237
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.56642695432272E-01,  1.56217959830772E-02)
-X( 2) = ( -4.11082563332091E-01, -2.15905913608582E-01)
-X( 3) = (  7.28002464733423E-01, -6.21286967095258E-01)
-X( 4) = ( -1.22884482813434E+00,  1.39627601962302E-01)
-
-X( 5) = ( -9.54320214790827E-01, -9.98532941124429E-03)
-
-PATH NUMBER =      4238
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.69092151312220E-01, -2.40732924926149E-01)
-X( 2) = ( -5.08229620012094E-02, -3.99579595440782E-01)
-X( 3) = (  4.02651763872148E-01, -7.24046105824169E-01)
-X( 4) = ( -1.17841849042697E+00,  6.72678600616003E-02)
-
-X( 5) = ( -7.51602291382912E-01, -3.15134430573176E-01)
-
-PATH NUMBER =      4239
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.96619514717806E-01, -3.00552156421700E-01)
-X( 2) = (  3.43215070585817E-01, -3.08711390749441E-01)
-X( 3) = (  2.19470968569507E-01, -1.01189557234360E+00)
-X( 4) = ( -1.09327772910552E+00,  4.42505069532078E-02)
-
-X( 5) = ( -5.27303271498810E-01, -2.73810526055252E-01)
-
-PATH NUMBER =      4240
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.96675540149423E-01, -6.46905348580559E-02)
-X( 2) = (  6.26044293298648E-01,  1.42112779119026E-01)
-X( 3) = (  4.08547488885651E-01, -1.16493844733149E+00)
-X( 4) = ( -7.78736096002407E-01, -1.76881554513160E-01)
-
-X( 5) = ( -6.20511229784501E-01, -7.41102024107748E-02)
-
-PATH NUMBER =      4241
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.12460512896909E-01,  2.47473451408773E-01)
-X( 2) = (  6.04980567106514E-01,  5.45943586744924E-01)
-X( 3) = (  6.60214863926535E-01, -1.39532085005197E+00)
-X( 4) = ( -7.41283890158797E-01, -9.70311940884186E-02)
-
-X( 5) = ( -5.11475820699548E-01,  3.00719923754806E-02)
-
-PATH NUMBER =      4242
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.00501805304125E-01,  5.61030084300324E-01)
-X( 2) = (  3.29267377154014E-01,  8.41756430676857E-01)
-X( 3) = (  1.00109021204948E+00, -1.41003533900978E+00)
-X( 4) = ( -7.63920658299780E-01, -1.17884553322950E-02)
-
-X( 5) = ( -4.55932655768624E-01,  1.30104393350341E-01)
-
-PATH NUMBER =      4243
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.13186140936172E-01,  7.29262730492834E-01)
-X( 2) = ( -7.20860107692901E-02,  8.91137193645519E-01)
-X( 3) = (  1.27167416946026E+00, -1.20219684128823E+00)
-X( 4) = ( -8.36054405032535E-01,  3.89606369237056E-02)
-
-X( 5) = ( -4.28574566230866E-01,  2.35868167674876E-01)
-
-PATH NUMBER =      4244
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.84951712308738E-01,  6.73453465135231E-01)
-X( 2) = ( -4.11281885908037E-01,  6.70980067851823E-01)
-X( 3) = (  1.34535749528065E+00, -8.69055299838837E-01)
-X( 4) = ( -9.23932948583510E-01,  3.14700183996654E-02)
-
-X( 5) = ( -4.31020765569178E-01,  3.66153669428712E-01)
-
-PATH NUMBER =      4245
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.06169435040652E-02,  4.19716063739232E-01)
-X( 2) = ( -5.29606728542564E-01,  2.84299019228547E-01)
-X( 3) = (  1.18766294246035E+00, -5.66491344361595E-01)
-X( 4) = ( -9.86436941763982E-01, -3.07553672480656E-02)
-
-X( 5) = ( -5.07640911185921E-01,  5.50272365436646E-01)
-
-PATH NUMBER =      4246
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.26528566686815E-02,  8.67770763951249E-02)
-X( 2) = ( -3.71695029770031E-01, -8.79735920923161E-02)
-X( 3) = (  8.72377544843697E-01, -4.36078012248111E-01)
-X( 4) = ( -9.94320071510301E-01, -1.18599570516784E-01)
-
-X( 5) = ( -8.61851142412760E-01,  7.34692257226139E-01)
-
-PATH NUMBER =      4247
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.79796599211267E-01, -1.69577644514101E-01)
-X( 2) = ( -1.14354284391498E-02, -2.71647273924517E-01)
-X( 3) = (  5.47026843982421E-01, -5.38837150977022E-01)
-X( 4) = ( -9.43893733802936E-01, -1.90959312417486E-01)
-
-X( 5) = ( -1.29599124834489E+00,  1.87507540309236E-01)
-
-PATH NUMBER =      4248
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07323962616853E-01, -2.29396876009653E-01)
-X( 2) = (  3.82602604147876E-01, -1.80779069233175E-01)
-X( 3) = (  3.63846048679781E-01, -8.26686617496456E-01)
-X( 4) = ( -8.58752972481481E-01, -2.13976665525879E-01)
-
-X( 5) = ( -8.68938230556563E-01, -1.49103284481392E-01)
-
-PATH NUMBER =      4249
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.29324557430815E-01, -1.96138024127754E-01)
-X( 2) = (  5.73983583362936E-01,  2.65432441661677E-01)
-X( 3) = (  4.00095195350243E-01, -9.30257644012577E-01)
-X( 4) = ( -4.33094482462787E-01, -2.23945437330408E-01)
-
-X( 5) = ( -1.07983661899015E+00,  1.85458914657983E-02)
-
-PATH NUMBER =      4250
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.45109530178301E-01,  1.16025962139075E-01)
-X( 2) = (  5.52919857170802E-01,  6.69263249287574E-01)
-X( 3) = (  6.51762570391127E-01, -1.16064004673306E+00)
-X( 4) = ( -3.95642276619176E-01, -1.44095076905666E-01)
-
-X( 5) = ( -7.32569204660870E-01,  1.82518898350093E-01)
-
-PATH NUMBER =      4251
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.33150822585517E-01,  4.29582595030626E-01)
-X( 2) = (  2.77206667218302E-01,  9.65076093219508E-01)
-X( 3) = (  9.92637918514075E-01, -1.17535453569086E+00)
-X( 4) = ( -4.18279044760159E-01, -5.88523381495426E-02)
-
-X( 5) = ( -5.50719105280987E-01,  3.16471866478878E-01)
-
-PATH NUMBER =      4252
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.45835158217564E-01,  5.97815241223137E-01)
-X( 2) = ( -1.24146720705002E-01,  1.01445685618817E+00)
-X( 3) = (  1.26322187592485E+00, -9.67516037969312E-01)
-X( 4) = ( -4.90412791492914E-01, -8.10324589354212E-03)
-
-X( 5) = ( -4.19084298431985E-01,  4.42691801312441E-01)
-
-PATH NUMBER =      4253
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.23992704098702E-02,  5.42005975865533E-01)
-X( 2) = ( -4.63342595843749E-01,  7.94299730394474E-01)
-X( 3) = (  1.33690520174525E+00, -6.34374496519920E-01)
-X( 4) = ( -5.78291335043889E-01, -1.55938644175825E-02)
-
-X( 5) = ( -2.98606732373486E-01,  5.89148811820122E-01)
-
-PATH NUMBER =      4254
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.97967926222673E-01,  2.88268574469534E-01)
-X( 2) = ( -5.81667438478276E-01,  4.07618681771198E-01)
-X( 3) = (  1.17921064892494E+00, -3.31810541042679E-01)
-X( 4) = ( -6.40795328224361E-01, -7.78192500653134E-02)
-
-X( 5) = ( -1.65151584434363E-01,  8.08419983312678E-01)
-
-PATH NUMBER =      4255
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.00003839387290E-01, -4.46704128745729E-02)
-X( 2) = ( -4.23755739705743E-01,  3.53460704503345E-02)
-X( 3) = (  8.63925251308290E-01, -2.01397208929194E-01)
-X( 4) = ( -6.48678457970680E-01, -1.65663453334032E-01)
-
-X( 5) = ( -1.46182151865876E-02,  1.28435048973189E+00)
-
-PATH NUMBER =      4256
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.75543835073415E-02, -3.01025133783799E-01)
-X( 2) = ( -6.34961383748618E-02, -1.48327611381867E-01)
-X( 3) = (  5.38574550447014E-01, -3.04156347658105E-01)
-X( 4) = ( -5.98252120263315E-01, -2.38023195234734E-01)
-
-X( 5) = ( -8.59467541641563E-01,  2.92156468133631E+00)
-
-PATH NUMBER =      4257
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.39972979898245E-01, -3.60844365279351E-01)
-X( 2) = (  3.30541894212164E-01, -5.74594066905250E-02)
-X( 3) = (  3.55393755144373E-01, -5.92005814177539E-01)
-X( 4) = ( -5.13111358941861E-01, -2.61040548343126E-01)
-
-X( 5) = ( -2.19674508796262E+00,  6.68714058274181E-02)
-
-PATH NUMBER =      4258
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.09014640183794E-01, -4.68682541973789E-01)
-X( 2) = (  4.54834414698714E-01,  3.26436804581621E-01)
-X( 3) = (  2.42770450251150E-01, -7.55914748281417E-01)
-X( 4) = ( -1.38065564361417E-01, -3.78243166588320E-02)
-
-X( 5) = ( -1.96327584165952E+00, -1.73764946209593E+00)
-
-PATH NUMBER =      4259
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.24799612931279E-01, -1.56518555706960E-01)
-X( 2) = (  4.33770688506579E-01,  7.30267612207518E-01)
-X( 3) = (  4.94437825292034E-01, -9.86297151001897E-01)
-X( 4) = ( -1.00613358517807E-01,  4.20260437659096E-02)
-
-X( 5) = ( -1.54032653034322E+00,  1.23051349354215E-01)
-
-PATH NUMBER =      4260
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.12840905338496E-01,  1.57038077184591E-01)
-X( 2) = (  1.58057498554080E-01,  1.02608045613945E+00)
-X( 3) = (  8.35313173414982E-01, -1.00101163995970E+00)
-X( 4) = ( -1.23250126658789E-01,  1.27268782522033E-01)
-
-X( 5) = ( -9.15920469046172E-01,  6.51670004820912E-01)
-
-PATH NUMBER =      4261
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25525240970542E-01,  3.25270723377102E-01)
-X( 2) = ( -2.43295889369224E-01,  1.07546121910811E+00)
-X( 3) = (  1.10589713082576E+00, -7.93173142238151E-01)
-X( 4) = ( -1.95383873391544E-01,  1.78017874778033E-01)
-
-X( 5) = ( -4.47765128140838E-01,  8.47257996420764E-01)
-
-PATH NUMBER =      4262
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.02709187656892E-01,  2.69461458019499E-01)
-X( 2) = ( -5.82491764507971E-01,  8.55304093314418E-01)
-X( 3) = (  1.17958045664615E+00, -4.60031600788759E-01)
-X( 4) = ( -2.83262416942519E-01,  1.70527256253993E-01)
-
-X( 5) = ( -3.77825910769780E-02,  9.22876247292702E-01)
-
-PATH NUMBER =      4263
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.18277843469695E-01,  1.57240566234987E-02)
-X( 2) = ( -7.00816607142498E-01,  4.68623044691142E-01)
-X( 3) = (  1.02188590382585E+00, -1.57467645311518E-01)
-X( 4) = ( -3.45766410122991E-01,  1.08301870606262E-01)
-
-X( 5) = (  3.96744239366458E-01,  9.16755088687692E-01)
-
-PATH NUMBER =      4264
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.20313756634311E-01, -3.17214930720608E-01)
-X( 2) = ( -5.42904908369965E-01,  9.63504333702789E-02)
-X( 3) = (  7.06600506209197E-01, -2.70543131980332E-02)
-X( 4) = ( -3.53649539869310E-01,  2.04576673375434E-02)
-
-X( 5) = (  9.58763510782385E-01,  7.74236295467218E-01)
-
-PATH NUMBER =      4265
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.07864300754363E-01, -5.73569651629834E-01)
-X( 2) = ( -1.82645307039084E-01, -8.73232484619223E-02)
-X( 3) = (  3.81249805347921E-01, -1.29813451926944E-01)
-X( 4) = ( -3.03223202161945E-01, -5.19020745631580E-02)
-
-X( 5) = (  1.81347819193486E+00,  1.53454344996661E-01)
-
-PATH NUMBER =      4266
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19663062651223E-01, -6.33388883125386E-01)
-X( 2) = (  2.11392725547942E-01,  3.54495622941944E-03)
-X( 3) = (  1.98069010045280E-01, -4.17662918446378E-01)
-X( 4) = ( -2.18082440840491E-01, -7.49194276715505E-02)
-
-X( 5) = (  1.86664292887135E+00, -2.56609560368331E+00)
-
-PATH NUMBER =      4267
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.92040135784032E-01, -7.54797479501084E-01)
-X( 2) = (  3.24348007519479E-01,  2.96581248480644E-01)
-X( 3) = (  1.01872502900178E-02, -7.23486738656080E-01)
-X( 4) = ( -3.16966513591206E-02,  2.94393666633491E-01)
-
-X( 5) = (  4.23150927521945E-02, -1.14770898141576E+00)
-
-PATH NUMBER =      4268
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.07825108531517E-01, -4.42633493234254E-01)
-X( 2) = (  3.03284281327345E-01,  7.00412056106541E-01)
-X( 3) = (  2.61854625330902E-01, -9.53869141376561E-01)
-X( 4) = (  5.75555448448962E-03,  3.74244027058232E-01)
-
-X( 5) = ( -7.66184868042797E-01, -1.32406958809850E+00)
-
-PATH NUMBER =      4269
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.95866400938734E-01, -1.29076860342703E-01)
-X( 2) = (  2.75710913748462E-02,  9.96224900038475E-01)
-X( 3) = (  6.02729973453850E-01, -9.68583630334368E-01)
-X( 4) = ( -1.68812136564928E-02,  4.59486765814356E-01)
-
-X( 5) = ( -2.31205779592485E+00, -5.76909457896635E-01)
-
-PATH NUMBER =      4270
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.08550736570780E-01,  3.91557858498068E-02)
-X( 2) = ( -3.73782296548458E-01,  1.04560566300714E+00)
-X( 3) = (  8.73313930864629E-01, -7.60745132612814E-01)
-X( 4) = ( -8.90149603892478E-02,  5.10235858070356E-01)
-
-X( 5) = ( -1.39193114812711E+00,  2.50116468981556E+00)
-
-PATH NUMBER =      4271
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.19683692056654E-01, -1.66534795077962E-02)
-X( 2) = ( -7.12978171687206E-01,  8.25448537213441E-01)
-X( 3) = (  9.46997256685021E-01, -4.27603591163423E-01)
-X( 4) = ( -1.76893503940223E-01,  5.02745239546316E-01)
-
-X( 5) = (  9.41340332732113E-01,  1.59902248635198E+00)
-
-PATH NUMBER =      4272
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.35252347869456E-01, -2.70390880903796E-01)
-X( 2) = ( -8.31303014321732E-01,  4.38767488590166E-01)
-X( 3) = (  7.89302703864713E-01, -1.25039635686182E-01)
-X( 4) = ( -2.39397497120695E-01,  4.40519853898585E-01)
-
-X( 5) = (  1.18722580344583E+00,  5.00265025411267E-01)
-
-PATH NUMBER =      4273
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.37288261034073E-01, -6.03329868247902E-01)
-X( 2) = ( -6.73391315549199E-01,  6.64948772693021E-02)
-X( 3) = (  4.74017306248064E-01,  5.37369642730340E-03)
-X( 4) = ( -2.47280626867014E-01,  3.52675650629866E-01)
-
-X( 5) = (  1.04037335172095E+00, -1.17866088231032E-01)
-
-PATH NUMBER =      4274
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.24838805154125E-01, -8.59684589157129E-01)
-X( 2) = ( -3.13131714218318E-01, -1.17178804562899E-01)
-X( 3) = (  1.48666605386789E-01, -9.73854423016077E-02)
-X( 4) = ( -1.96854289159649E-01,  2.80315908729165E-01)
-
-X( 5) = (  8.05128659239489E-01, -5.31353389780861E-01)
-
-PATH NUMBER =      4275
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.02688558251461E-01, -9.19503820652680E-01)
-X( 2) = (  8.09063183687079E-02, -2.63105998715573E-02)
-X( 3) = ( -3.45141899158517E-02, -3.85234908821042E-01)
-X( 4) = ( -1.11713527838195E-01,  2.57298555620772E-01)
-
-X( 5) = (  4.96241355821955E-01, -8.60324853350513E-01)
-
-PATH NUMBER =      4276
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.39552492114577E-01, -9.20606477627283E-01)
-X( 2) = (  2.43580401939276E-01,  1.89835519865940E-01)
-X( 3) = ( -1.88826140397000E-01, -8.48147041237445E-01)
-X( 4) = ( -1.63758940008460E-01,  6.17260025972469E-01)
-
-X( 5) = ( -5.03859979818264E-02, -6.42364540308843E-01)
-
-PATH NUMBER =      4277
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.55337464862062E-01, -6.08442491360454E-01)
-X( 2) = (  2.22516675747142E-01,  5.93666327491837E-01)
-X( 3) = (  6.28412346438843E-02, -1.07852944395793E+00)
-X( 4) = ( -1.26306734164850E-01,  6.97110386397211E-01)
-
-X( 5) = ( -2.70742203793762E-01, -6.99824795262352E-01)
-
-PATH NUMBER =      4278
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.43378757269278E-01, -2.94885858468904E-01)
-X( 2) = ( -5.31965142053578E-02,  8.89479171423771E-01)
-X( 3) = (  4.03716582766833E-01, -1.09324393291573E+00)
-X( 4) = ( -1.48943502305833E-01,  7.82353125153335E-01)
-
-X( 5) = ( -6.08915146874076E-01, -8.45809188303905E-01)
-
-PATH NUMBER =      4279
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.56063092901325E-01, -1.26653212276394E-01)
-X( 2) = ( -4.54549902128662E-01,  9.38859934392432E-01)
-X( 3) = (  6.74300540177612E-01, -8.85405435194179E-01)
-X( 4) = ( -2.21077249038588E-01,  8.33102217409335E-01)
-
-X( 5) = ( -1.33162705247167E+00, -1.53142306882903E+00)
-
-PATH NUMBER =      4280
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.27828664273891E-01, -1.82462477633997E-01)
-X( 2) = ( -7.93745777267409E-01,  7.18702808598736E-01)
-X( 3) = (  7.47983865998003E-01, -5.52263893744787E-01)
-X( 4) = ( -3.08955792589563E-01,  8.25611598885295E-01)
-
-X( 5) = (  2.01196875551185E+00, -3.56697370678133E+00)
-
-PATH NUMBER =      4281
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.77399915389110E-02, -4.36199879029996E-01)
-X( 2) = ( -9.12070619901936E-01,  3.32021759975461E-01)
-X( 3) = (  5.90289313177696E-01, -2.49699938267546E-01)
-X( 4) = ( -3.71459785770035E-01,  7.63386213237564E-01)
-
-X( 5) = (  1.22988806770981E+00, -8.22412338532970E-01)
-
-PATH NUMBER =      4282
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.97759047035279E-02, -7.69138866374103E-01)
-X( 2) = ( -7.54158921129403E-01, -4.02508513454027E-02)
-X( 3) = (  2.75003915561047E-01, -1.19286606154061E-01)
-X( 4) = ( -3.79342915516354E-01,  6.75542009968846E-01)
-
-X( 5) = (  6.37184805804513E-01, -6.28419824010254E-01)
-
-PATH NUMBER =      4283
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22673551176420E-01, -1.02549358728333E+00)
-X( 2) = ( -3.93899319798522E-01, -2.23924533177604E-01)
-X( 3) = ( -5.03467853002288E-02, -2.22045744882972E-01)
-X( 4) = ( -3.28916577808989E-01,  6.03182268068144E-01)
-
-X( 5) = (  3.44781133438122E-01, -6.04593796899463E-01)
-
-PATH NUMBER =      4284
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.50200914582006E-01, -1.08531281877888E+00)
-X( 2) = (  1.38712788504375E-04, -1.33056328486262E-01)
-X( 3) = ( -2.33527580602869E-01, -5.09895211402406E-01)
-X( 4) = ( -2.43775816487535E-01,  5.80164914959751E-01)
-
-X( 5) = (  1.38604438509708E-01, -6.14179734492997E-01)
-
-PATH NUMBER =      4285
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03573792685494E+00, -8.88525663367390E-01)
-X( 2) = (  2.50323658241030E-01,  5.61471315029545E-02)
-X( 3) = ( -2.61149144519980E-01, -1.07156571500275E+00)
-X( 4) = ( -4.72459017741559E-01,  7.79702003563506E-01)
-
-X( 5) = ( -1.55881610182723E-01, -4.54895334275534E-01)
-
-PATH NUMBER =      4286
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15152289960242E+00, -5.76361677100561E-01)
-X( 2) = (  2.29259932048895E-01,  4.59977939128852E-01)
-X( 3) = ( -9.48176947909554E-03, -1.30194811772323E+00)
-X( 4) = ( -4.35006811897949E-01,  8.59552363988248E-01)
-
-X( 5) = ( -2.69605091653989E-01, -4.33759468124998E-01)
-
-PATH NUMBER =      4287
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03956419200964E+00, -2.62805044209010E-01)
-X( 2) = ( -4.64532579036041E-02,  7.55790783060786E-01)
-X( 3) = (  3.31393578643853E-01, -1.31666260668104E+00)
-X( 4) = ( -4.57643580038931E-01,  9.44795102744372E-01)
-
-X( 5) = ( -4.15957029962874E-01, -4.47856031365877E-01)
-
-PATH NUMBER =      4288
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.52248527641683E-01, -9.45723980165002E-02)
-X( 2) = ( -4.47806645826908E-01,  8.05171546029448E-01)
-X( 3) = (  6.01977536054632E-01, -1.10882410895948E+00)
-X( 4) = ( -5.29777326771686E-01,  9.95544195000372E-01)
-
-X( 5) = ( -6.28177314072181E-01, -5.67802289332709E-01)
-
-PATH NUMBER =      4289
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.24014099014249E-01, -1.50381663374103E-01)
-X( 2) = ( -7.87002520965655E-01,  5.85014420235751E-01)
-X( 3) = (  6.75660861875024E-01, -7.75682567510093E-01)
-X( 4) = ( -6.17655870322661E-01,  9.88053576476332E-01)
-
-X( 5) = ( -7.36457183814398E-01, -1.07664905016715E+00)
-
-PATH NUMBER =      4290
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.08445443201447E-01, -4.04119064770103E-01)
-X( 2) = ( -9.05327363600182E-01,  1.98333371612475E-01)
-X( 3) = (  5.17966309054716E-01, -4.73118612032852E-01)
-X( 4) = ( -6.80159863503133E-01,  9.25828190828601E-01)
-
-X( 5) = (  1.43217195170322E-02, -1.25648042700754E+00)
-
-PATH NUMBER =      4291
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.06409530036830E-01, -7.37058052114209E-01)
-X( 2) = ( -7.47415664827649E-01, -1.73939239708388E-01)
-X( 3) = (  2.02680911438067E-01, -3.42705279919367E-01)
-X( 4) = ( -6.88042993249452E-01,  8.37983987559882E-01)
-
-X( 5) = (  1.60762208815139E-01, -7.97688194145384E-01)
-
-PATH NUMBER =      4292
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.18858985916779E-01, -9.93412773023436E-01)
-X( 2) = ( -3.87156063496768E-01, -3.57612921540589E-01)
-X( 3) = ( -1.22669789423209E-01, -4.45464418648278E-01)
-X( 4) = ( -6.37616655542087E-01,  7.65624245659181E-01)
-
-X( 5) = (  5.66136904977574E-02, -5.94062117112867E-01)
-
-PATH NUMBER =      4293
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.46386349322365E-01, -1.05323200451899E+00)
-X( 2) = (  6.88196909025811E-03, -2.66744716849247E-01)
-X( 3) = ( -3.05850584725849E-01, -7.33313885167712E-01)
-X( 4) = ( -5.52475894220633E-01,  7.42606892550788E-01)
-
-X( 5) = ( -5.18288345203755E-02, -5.02435172486592E-01)
-
-PATH NUMBER =      4294
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22276620523245E+00, -6.11798726552702E-01)
-X( 2) = (  5.92921129172140E-01, -2.03062108815434E-01)
-X( 3) = ( -1.81930900625868E-01, -7.60878155981445E-01)
-X( 4) = ( -7.69027098694566E-01,  4.47285753825901E-01)
-
-X( 5) = ( -4.41471622968044E-01, -2.85155207539700E-01)
-
-PATH NUMBER =      4295
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.33855117797994E+00, -2.99634740285873E-01)
-X( 2) = (  5.71857402980006E-01,  2.00768698810463E-01)
-X( 3) = (  6.97364744150158E-02, -9.91260558701925E-01)
-X( 4) = ( -7.31574892850955E-01,  5.27136114250643E-01)
-
-X( 5) = ( -4.48723388127041E-01, -1.66869581514318E-01)
-
-PATH NUMBER =      4296
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22659247038715E+00,  1.39218926056782E-02)
-X( 2) = (  2.96144213027506E-01,  4.96581542742398E-01)
-X( 3) = (  4.10611822537965E-01, -1.00597504765973E+00)
-X( 4) = ( -7.54211660991938E-01,  6.12378853006766E-01)
-
-X( 5) = ( -4.82688480786319E-01, -6.25075126477764E-02)
-
-PATH NUMBER =      4297
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.39276806019201E-01,  1.82154538798188E-01)
-X( 2) = ( -1.05209174895798E-01,  5.45962305711059E-01)
-X( 3) = (  6.81195779948744E-01, -7.98136549938178E-01)
-X( 4) = ( -8.26345407724693E-01,  6.63127945262767E-01)
-
-X( 5) = ( -5.51985602828798E-01,  4.38468202530082E-02)
-
-PATH NUMBER =      4298
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.11042377391767E-01,  1.26345273440585E-01)
-X( 2) = ( -4.44405050034545E-01,  3.25805179917363E-01)
-X( 3) = (  7.54879105769136E-01, -4.64995008488787E-01)
-X( 4) = ( -9.14223951275668E-01,  6.55637326738727E-01)
-
-X( 5) = ( -7.02113511189679E-01,  1.56340962777838E-01)
-
-PATH NUMBER =      4299
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.95473721578964E-01, -1.27392127955415E-01)
-X( 2) = ( -5.62729892669072E-01, -6.08758687059132E-02)
-X( 3) = (  5.97184552948827E-01, -1.62431053011546E-01)
-X( 4) = ( -9.76727944456140E-01,  5.93411941090996E-01)
-
-X( 5) = ( -1.06808328111694E+00,  1.62402646940329E-01)
-
-PATH NUMBER =      4300
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.93437808414348E-01, -4.60331115299522E-01)
-X( 2) = ( -4.04818193896538E-01, -4.33148480026776E-01)
-X( 3) = (  2.81899155332178E-01, -3.20177208980609E-02)
-X( 4) = ( -9.84611074202459E-01,  5.05567737822277E-01)
-
-X( 5) = ( -1.26871838742307E+00, -5.02324734037843E-01)
-
-PATH NUMBER =      4301
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.05887264294296E-01, -7.16685836208748E-01)
-X( 2) = ( -4.45585925656575E-02, -6.16822161858978E-01)
-X( 3) = ( -4.34515455290970E-02, -1.34776859626972E-01)
-X( 4) = ( -9.34184736495095E-01,  4.33207995921576E-01)
-
-X( 5) = ( -6.81264246997246E-01, -6.52835430274343E-01)
-
-PATH NUMBER =      4302
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.33414627699882E-01, -7.76505067704299E-01)
-X( 2) = (  3.49479440021369E-01, -5.25953957167636E-01)
-X( 3) = ( -2.26632340831738E-01, -4.22626326146406E-01)
-X( 4) = ( -8.49043975173640E-01,  4.10190642813183E-01)
-
-X( 5) = ( -4.81572667230783E-01, -4.41895526499454E-01)
-
-PATH NUMBER =      4303
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24260483162052E+00, -3.14542239156804E-01)
-X( 2) = (  7.25749444688056E-01, -2.19636042743380E-01)
-X( 3) = (  2.55347835965572E-02, -8.70898656718997E-01)
-X( 4) = ( -9.82606423584846E-01,  1.71483277304170E-01)
-
-X( 5) = ( -4.43015542314072E-01, -1.17887826237635E-01)
-
-PATH NUMBER =      4304
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.35838980436800E+00, -2.37825288997540E-03)
-X( 2) = (  7.04685718495922E-01,  1.84194764882518E-01)
-X( 3) = (  2.77202158637441E-01, -1.10128105943948E+00)
-X( 4) = ( -9.45154217741236E-01,  2.51333637728912E-01)
-
-X( 5) = ( -4.00936751333636E-01, -4.16975303819773E-02)
-
-PATH NUMBER =      4305
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24643109677522E+00,  3.11178380001576E-01)
-X( 2) = (  4.28972528543422E-01,  4.80007608814452E-01)
-X( 3) = (  6.18077506760390E-01, -1.11599554839728E+00)
-X( 4) = ( -9.67790985882219E-01,  3.36576376485035E-01)
-
-X( 5) = ( -3.89992817257004E-01,  3.17813141405324E-02)
-
-PATH NUMBER =      4306
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.59115432407264E-01,  4.79411026194086E-01)
-X( 2) = (  2.76191406201174E-02,  5.29388371783113E-01)
-X( 3) = (  8.88661464171169E-01, -9.08157050675731E-01)
-X( 4) = ( -1.03992473261497E+00,  3.87325468741036E-01)
-
-X( 5) = ( -4.04302180218563E-01,  1.07543896140484E-01)
-
-PATH NUMBER =      4307
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.30881003779830E-01,  4.23601760836483E-01)
-X( 2) = ( -3.11576734518629E-01,  3.09231245989417E-01)
-X( 3) = (  9.62344789991560E-01, -5.75015509226339E-01)
-X( 4) = ( -1.12780327616595E+00,  3.79834850216996E-01)
-
-X( 5) = ( -4.57191437037927E-01,  1.89474595945144E-01)
-
-PATH NUMBER =      4308
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.15312347967027E-01,  1.69864359440483E-01)
-X( 2) = ( -4.29901577153156E-01, -7.74498026338590E-02)
-X( 3) = (  8.04650237171253E-01, -2.72451553749098E-01)
-X( 4) = ( -1.19030726934642E+00,  3.17609464569264E-01)
-
-X( 5) = ( -5.92966203451128E-01,  2.54113666243530E-01)
-
-PATH NUMBER =      4309
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.13276434802411E-01, -1.63074627903624E-01)
-X( 2) = ( -2.71989878380623E-01, -4.49722413954722E-01)
-X( 3) = (  4.89364839554604E-01, -1.42038221635613E-01)
-X( 4) = ( -1.19819039909274E+00,  2.29765261300546E-01)
-
-X( 5) = ( -8.16193314878060E-01,  1.38191353143407E-01)
-
-PATH NUMBER =      4310
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.25725890682359E-01, -4.19429348812849E-01)
-X( 2) = (  8.82697229502581E-02, -6.33396095786923E-01)
-X( 3) = (  1.64014138693328E-01, -2.44797360364524E-01)
-X( 4) = ( -1.14776406138537E+00,  1.57405519399844E-01)
-
-X( 5) = ( -7.52649569675912E-01, -1.54573454003541E-01)
-
-PATH NUMBER =      4311
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.53253254087945E-01, -4.79248580308401E-01)
-X( 2) = (  4.82307755537284E-01, -5.42527891095581E-01)
-X( 3) = ( -1.91666566093124E-02, -5.32646826883958E-01)
-X( 4) = ( -1.06262330006392E+00,  1.34388166291452E-01)
-
-X( 5) = ( -5.46262821477171E-01, -1.87871835137046E-01)
-
-PATH NUMBER =      4312
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06672931412718E+00, -7.40785355706625E-02)
-X( 2) = (  8.38155357050524E-01, -1.46952017300338E-01)
-X( 3) = (  2.55182532818630E-01, -8.21822878684851E-01)
-X( 4) = ( -9.68935263953117E-01, -1.77079820958443E-01)
-
-X( 5) = ( -4.53962210246319E-01,  2.64294203044523E-02)
-
-PATH NUMBER =      4313
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18251428687466E+00,  2.38085450696166E-01)
-X( 2) = (  8.17091630858390E-01,  2.56878790325559E-01)
-X( 3) = (  5.06849907859514E-01, -1.05220528140533E+00)
-X( 4) = ( -9.31483058109506E-01, -9.72294605337015E-02)
-
-X( 5) = ( -3.80523187630513E-01,  6.43629706606358E-02)
-
-PATH NUMBER =      4314
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07055557928188E+00,  5.51642083587718E-01)
-X( 2) = (  5.41378440905890E-01,  5.52691634257493E-01)
-X( 3) = (  8.47725255982463E-01, -1.06691977036314E+00)
-X( 4) = ( -9.54119826250489E-01, -1.19867217775781E-02)
-
-X( 5) = ( -3.40185168412440E-01,  1.15735449895428E-01)
-
-PATH NUMBER =      4315
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.83239914913927E-01,  7.19874729780228E-01)
-X( 2) = (  1.40025052982586E-01,  6.02072397226155E-01)
-X( 3) = (  1.11830921339324E+00, -8.59081272641585E-01)
-X( 4) = ( -1.02625357298324E+00,  3.87623704784227E-02)
-
-X( 5) = ( -3.21980972562112E-01,  1.75029013525173E-01)
-
-PATH NUMBER =      4316
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.55005486286493E-01,  6.64065464422625E-01)
-X( 2) = ( -1.99170822156161E-01,  3.81915271432458E-01)
-X( 3) = (  1.19199253921363E+00, -5.25939731192194E-01)
-X( 4) = ( -1.11413211653422E+00,  3.12717519543826E-02)
-
-X( 5) = ( -3.28035996873033E-01,  2.45492546394020E-01)
-
-PATH NUMBER =      4317
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.39436830473690E-01,  4.10328063026625E-01)
-X( 2) = ( -3.17495664790688E-01, -4.76577719081801E-03)
-X( 3) = (  1.03429798639333E+00, -2.23375775714952E-01)
-X( 4) = ( -1.17663610971469E+00, -3.09536336933483E-02)
-
-X( 5) = ( -3.80425976796172E-01,  3.26882524002333E-01)
-
-PATH NUMBER =      4318
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.37400917309074E-01,  7.73890756825181E-02)
-X( 2) = ( -1.59583966018155E-01, -3.77038388511681E-01)
-X( 3) = (  7.19012588776677E-01, -9.29624436014675E-02)
-X( 4) = ( -1.18451923946101E+00, -1.18797836962067E-01)
-
-X( 5) = ( -5.26701047453174E-01,  3.66836600451675E-01)
-
-PATH NUMBER =      4319
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.49850373189022E-01, -1.78965645226708E-01)
-X( 2) = (  2.00675635312726E-01, -5.60712070343882E-01)
-X( 3) = (  3.93661887915401E-01, -1.95721582330379E-01)
-X( 4) = ( -1.13409290175365E+00, -1.91157578862769E-01)
-
-X( 5) = ( -6.68419712012828E-01,  2.09482643608743E-01)
-
-PATH NUMBER =      4320
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.77377736594608E-01, -2.38784876722259E-01)
-X( 2) = (  5.94713667899753E-01, -4.69843865652540E-01)
-X( 3) = (  2.10481092612760E-01, -4.83571048849812E-01)
-X( 4) = ( -1.04895214043219E+00, -2.14174931971161E-01)
-
-X( 5) = ( -5.76847210770404E-01,  4.20690122424149E-02)
-
-PATH NUMBER =      4321
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.77433762026225E-01, -2.92325515861515E-03)
-X( 2) = (  8.77542890612584E-01, -1.90196957840734E-02)
-X( 3) = (  3.99557612928904E-01, -6.36613923837704E-01)
-X( 4) = ( -7.34410507329080E-01, -4.35306993437530E-01)
-
-X( 5) = ( -4.76665855724508E-01,  1.86413487841192E-01)
-
-PATH NUMBER =      4322
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.93218734773710E-01,  3.09240731108214E-01)
-X( 2) = (  8.56479164420449E-01,  3.84811111841824E-01)
-X( 3) = (  6.51224987969788E-01, -8.66996326558184E-01)
-X( 4) = ( -6.96958301485470E-01, -3.55456633012788E-01)
-
-X( 5) = ( -3.76968608746182E-01,  1.75749904242580E-01)
-
-PATH NUMBER =      4323
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.81260027180927E-01,  6.22797363999765E-01)
-X( 2) = (  5.80765974467950E-01,  6.80623955773758E-01)
-X( 3) = (  9.92100336092736E-01, -8.81710815515991E-01)
-X( 4) = ( -7.19595069626452E-01, -2.70213894256664E-01)
-
-X( 5) = ( -3.09720026161379E-01,  2.02946231239290E-01)
-
-PATH NUMBER =      4324
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.93944362812973E-01,  7.91030010192275E-01)
-X( 2) = (  1.79412586544646E-01,  7.30004718742419E-01)
-X( 3) = (  1.26268429350352E+00, -6.73872317794437E-01)
-X( 4) = ( -7.91728816359207E-01, -2.19464802000664E-01)
-
-X( 5) = ( -2.64343668712591E-01,  2.46745778762261E-01)
-
-PATH NUMBER =      4325
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.65709934185540E-01,  7.35220744834672E-01)
-X( 2) = ( -1.59783288594101E-01,  5.09847592948723E-01)
-X( 3) = (  1.33636761932391E+00, -3.40730776345046E-01)
-X( 4) = ( -8.79607359910182E-01, -2.26955420524704E-01)
-
-X( 5) = ( -2.36350253067259E-01,  3.06414702733186E-01)
-
-PATH NUMBER =      4326
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.98587216272629E-02,  4.81483343438673E-01)
-X( 2) = ( -2.78108131228628E-01,  1.23166544325447E-01)
-X( 3) = (  1.17867306650360E+00, -3.81668208678049E-02)
-X( 4) = ( -9.42111353090655E-01, -2.89180806172435E-01)
-
-X( 5) = ( -2.34909557798509E-01,  3.89271114415953E-01)
-
-PATH NUMBER =      4327
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.18946347918795E-02,  1.48544356094566E-01)
-X( 2) = ( -1.20196432456095E-01, -2.49106066995416E-01)
-X( 3) = (  8.63387668886951E-01,  9.22465112456801E-02)
-X( 4) = ( -9.49994482836974E-01, -3.77025009441154E-01)
-
-X( 5) = ( -3.02088115298491E-01,  4.93356043319286E-01)
-
-PATH NUMBER =      4328
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.60554821088068E-01, -1.07810364814660E-01)
-X( 2) = (  2.40063168874786E-01, -4.32779748827617E-01)
-X( 3) = (  5.38036968025675E-01, -1.05126274832309E-02)
-X( 4) = ( -8.99568145129609E-01, -4.49384751341856E-01)
-
-X( 5) = ( -4.94546638219198E-01,  5.06697901556682E-01)
-
-PATH NUMBER =      4329
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.88082184493655E-01, -1.67629596310211E-01)
-X( 2) = (  6.34101201461813E-01, -3.41911544136275E-01)
-X( 3) = (  3.54856172723034E-01, -2.98362094002665E-01)
-X( 4) = ( -8.14427383808154E-01, -4.72402104450248E-01)
-
-X( 5) = ( -5.80741449387545E-01,  3.05548468156941E-01)
-
-PATH NUMBER =      4330
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.10082779307617E-01, -1.34370744428313E-01)
-X( 2) = (  8.25482180676872E-01,  1.04299966758577E-01)
-X( 3) = (  3.91105319393496E-01, -4.01933120518787E-01)
-X( 4) = ( -3.88768893789459E-01, -4.82370876254777E-01)
-
-X( 5) = ( -5.30774326243472E-01,  4.20986531593129E-01)
-
-PATH NUMBER =      4331
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.25867752055103E-01,  1.77793241838516E-01)
-X( 2) = (  8.04418454484738E-01,  5.08130774384474E-01)
-X( 3) = (  6.42772694434380E-01, -6.32315523239267E-01)
-X( 4) = ( -3.51316687945849E-01, -4.02520515830036E-01)
-
-X( 5) = ( -3.99940771326503E-01,  3.22280381618998E-01)
-
-PATH NUMBER =      4332
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.13909044462319E-01,  4.91349874730067E-01)
-X( 2) = (  5.28705264532238E-01,  8.03943618316408E-01)
-X( 3) = (  9.83648042557329E-01, -6.47030012197074E-01)
-X( 4) = ( -3.73953456086832E-01, -3.17277777073912E-01)
-
-X( 5) = ( -2.96148352166768E-01,  3.12862673881533E-01)
-
-PATH NUMBER =      4333
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.26593380094365E-01,  6.59582520922578E-01)
-X( 2) = (  1.27351876608934E-01,  8.53324381285070E-01)
-X( 3) = (  1.25423199996811E+00, -4.39191514475521E-01)
-X( 4) = ( -4.46087202819587E-01, -2.66528684817912E-01)
-
-X( 5) = ( -2.18238122303321E-01,  3.36189024891381E-01)
-
-PATH NUMBER =      4334
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.01641048533069E-01,  6.03773255564975E-01)
-X( 2) = ( -2.11843998529813E-01,  6.33167255491374E-01)
-X( 3) = (  1.32791532578850E+00, -1.06049973026129E-01)
-X( 4) = ( -5.33965746370562E-01, -2.74019303341952E-01)
-
-X( 5) = ( -1.54896511426046E-01,  3.81132372973259E-01)
-
-PATH NUMBER =      4335
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.17209704345871E-01,  3.50035854168975E-01)
-X( 2) = ( -3.30168841164340E-01,  2.46486206868098E-01)
-X( 3) = (  1.17022077296819E+00,  1.96513982451112E-01)
-X( 4) = ( -5.96469739551034E-01, -3.36244688989683E-01)
-
-X( 5) = ( -1.03176301997892E-01,  4.55365194299133E-01)
-
-PATH NUMBER =      4336
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.19245617510488E-01,  1.70968668248679E-02)
-X( 2) = ( -1.72257142391807E-01, -1.25786404452765E-01)
-X( 3) = (  8.54935375351543E-01,  3.26927314564597E-01)
-X( 4) = ( -6.04352869297353E-01, -4.24088892258402E-01)
-
-X( 5) = ( -8.31988157727762E-02,  5.83415068171599E-01)
-
-PATH NUMBER =      4337
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.06796161630540E-01, -2.39257854084358E-01)
-X( 2) = (  1.88002458939074E-01, -3.09460086284966E-01)
-X( 3) = (  5.29584674490267E-01,  2.24168175835686E-01)
-X( 4) = ( -5.53926531589988E-01, -4.96448634159103E-01)
-
-X( 5) = ( -2.04124810537243E-01,  7.67832745155980E-01)
-
-PATH NUMBER =      4338
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.20731201775047E-01, -2.99077085579909E-01)
-X( 2) = (  5.82040491526100E-01, -2.18591881593624E-01)
-X( 3) = (  3.46403879187627E-01, -6.36812906837482E-02)
-X( 4) = ( -4.68785770268533E-01, -5.19465987267496E-01)
-
-X( 5) = ( -5.24264536489714E-01,  6.99956611985190E-01)
-
-PATH NUMBER =      4339
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.89772862060596E-01, -4.06915262274348E-01)
-X( 2) = (  7.06333012012650E-01,  1.65304329678521E-01)
-X( 3) = (  2.33780574294403E-01, -2.27590224787626E-01)
-X( 4) = ( -9.37399756880892E-02, -2.96249755583201E-01)
-
-X( 5) = ( -7.51277797245277E-01,  9.43746090765790E-01)
-
-PATH NUMBER =      4340
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.05557834808081E-01, -9.47512760075189E-02)
-X( 2) = (  6.85269285820516E-01,  5.69135137304419E-01)
-X( 3) = (  4.85447949335287E-01, -4.57972627508107E-01)
-X( 4) = ( -5.62877698444790E-02, -2.16399395158460E-01)
-
-X( 5) = ( -5.22843426351895E-01,  5.68881298299927E-01)
-
-PATH NUMBER =      4341
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.93599127215297E-01,  2.18805356884032E-01)
-X( 2) = (  4.09556095868016E-01,  8.64947981236352E-01)
-X( 3) = (  8.26323297458236E-01, -4.72687116465913E-01)
-X( 4) = ( -7.89245379854617E-02, -1.31156656402336E-01)
-
-X( 5) = ( -3.27101198422579E-01,  4.85096073343048E-01)
-
-PATH NUMBER =      4342
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06283462847344E-01,  3.87038003076542E-01)
-X( 2) = (  8.20270794471191E-03,  9.14328744205015E-01)
-X( 3) = (  1.09690725486902E+00, -2.64848618744361E-01)
-X( 4) = ( -1.51058284718217E-01, -8.04075641463356E-02)
-
-X( 5) = ( -1.86915375633573E-01,  4.74645162347007E-01)
-
-PATH NUMBER =      4343
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.21950965780090E-01,  3.31228737718939E-01)
-X( 2) = ( -3.30993167194035E-01,  6.94171618411318E-01)
-X( 3) = (  1.17059058068941E+00,  6.82929227050309E-02)
-X( 4) = ( -2.38936828269192E-01, -8.78981826703761E-02)
-
-X( 5) = ( -6.86023236014859E-02,  4.94739369810766E-01)
-
-PATH NUMBER =      4344
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.37519621592892E-01,  7.74913363229398E-02)
-X( 2) = ( -4.49318009828562E-01,  3.07490569788042E-01)
-X( 3) = (  1.01289602786910E+00,  3.70856878182272E-01)
-X( 4) = ( -3.01440821449664E-01, -1.50123568318107E-01)
-
-X( 5) = (  4.99598164862737E-02,  5.44835043672869E-01)
-
-PATH NUMBER =      4345
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.39555534757509E-01, -2.55447651021167E-01)
-X( 2) = ( -2.91406311056029E-01, -6.47820415328208E-02)
-X( 3) = (  6.97610630252450E-01,  5.01270210295757E-01)
-X( 4) = ( -3.09323951195983E-01, -2.37967771586826E-01)
-
-X( 5) = (  1.86163946141884E-01,  6.55771642344466E-01)
-
-PATH NUMBER =      4346
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.27106078877561E-01, -5.11802371930393E-01)
-X( 2) = (  6.88532902748522E-02, -2.48455723365022E-01)
-X( 3) = (  3.72259929391174E-01,  3.98511071566846E-01)
-X( 4) = ( -2.58897613488618E-01, -3.10327513487527E-01)
-
-X( 5) = (  3.17275111723174E-01,  9.49116069918232E-01)
-
-PATH NUMBER =      4347
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00421284528025E-01, -5.71621603425944E-01)
-X( 2) = (  4.62891322861878E-01, -1.57587518673680E-01)
-X( 3) = (  1.89079134088534E-01,  1.10661605047412E-01)
-X( 4) = ( -1.73756852167163E-01, -3.33344866595920E-01)
-
-X( 5) = ( -1.07889638171719E-01,  1.53914723104687E+00)
-
-PATH NUMBER =      4348
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.72798357660834E-01, -6.93030199801642E-01)
-X( 2) = (  5.75846604833416E-01,  1.35448773577545E-01)
-X( 3) = (  1.19737433327142E-03, -1.95162215162289E-01)
-X( 4) = (  1.26289373142069E-02,  3.59682277091213E-02)
-
-X( 5) = ( -4.91300954084673E+00,  7.73268553950687E-01)
-
-PATH NUMBER =      4349
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.88583330408319E-01, -3.80866213534813E-01)
-X( 2) = (  5.54782878641281E-01,  5.39279581203442E-01)
-X( 3) = (  2.52864749374155E-01, -4.25544617882770E-01)
-X( 4) = (  5.00811431578172E-02,  1.15818588133863E-01)
-
-X( 5) = ( -1.31597957878328E+00,  7.91295662717235E-01)
-
-PATH NUMBER =      4350
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.76624622815536E-01, -6.73095806432623E-02)
-X( 2) = (  2.79069688688782E-01,  8.35092425135376E-01)
-X( 3) = (  5.93740097497104E-01, -4.40259106840577E-01)
-X( 4) = (  2.74443750168345E-02,  2.01061326889986E-01)
-
-X( 5) = ( -6.09508072542283E-01,  7.64226627148530E-01)
-
-PATH NUMBER =      4351
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.89308958447582E-01,  1.00923065549248E-01)
-X( 2) = ( -1.22283699234523E-01,  8.84473188104038E-01)
-X( 3) = (  8.64324054907883E-01, -2.32420609119023E-01)
-X( 4) = ( -4.46893717159206E-02,  2.51810419145987E-01)
-
-X( 5) = ( -2.47816101312155E-01,  7.46470329905527E-01)
-
-PATH NUMBER =      4352
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.38925470179852E-01,  4.51138001916449E-02)
-X( 2) = ( -4.61479574373269E-01,  6.64316062310341E-01)
-X( 3) = (  9.38007380728275E-01,  1.00720932330368E-01)
-X( 4) = ( -1.32567915266896E-01,  2.44319800621947E-01)
-
-X( 5) = (  2.28709970099308E-02,  7.31452516906198E-01)
-
-PATH NUMBER =      4353
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.54494125992654E-01, -2.08623601204355E-01)
-X( 2) = ( -5.79804417007796E-01,  2.77635013687066E-01)
-X( 3) = (  7.80312827907967E-01,  4.03284887807609E-01)
-X( 4) = ( -1.95071908447368E-01,  1.82094414974216E-01)
-
-X( 5) = (  2.88187127125440E-01,  7.15294709146174E-01)
-
-PATH NUMBER =      4354
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.56530039157271E-01, -5.41562588548462E-01)
-X( 2) = ( -4.21892718235263E-01, -9.46375976337976E-02)
-X( 3) = (  4.65027430291318E-01,  5.33698219921094E-01)
-X( 4) = ( -2.02955038193687E-01,  9.42502117054967E-02)
-
-X( 5) = (  6.26694198667519E-01,  6.92610523826070E-01)
-
-PATH NUMBER =      4355
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.44080583277323E-01, -7.97917309457688E-01)
-X( 2) = ( -6.16331169043820E-02, -2.78311279465999E-01)
-X( 3) = (  1.39676729430042E-01,  4.30939081192183E-01)
-X( 4) = ( -1.52528700486322E-01,  2.18904698047953E-02)
-
-X( 5) = (  1.23988382799147E+00,  6.45601983420294E-01)
-
-PATH NUMBER =      4356
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.83446780128263E-01, -8.57736540953239E-01)
-X( 2) = (  3.32404915682644E-01, -1.87443074774657E-01)
-X( 3) = ( -4.35040658725982E-02,  1.43089614672749E-01)
-X( 4) = ( -6.73879391648673E-02, -1.12688330359732E-03)
-
-X( 5) = (  3.62968371222153E+00,  3.89197039564050E-01)
-
-PATH NUMBER =      4357
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.20310713991379E-01, -8.58839197927843E-01)
-X( 2) = (  4.95078999253212E-01,  2.87030449628399E-02)
-X( 3) = ( -1.97816016353746E-01, -3.19822517743654E-01)
-X( 4) = ( -1.19433351335133E-01,  3.58834587048100E-01)
-
-X( 5) = ( -6.50679946777521E-01, -1.19365177644884E+00)
-
-PATH NUMBER =      4358
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.36095686738864E-01, -5.46675211661014E-01)
-X( 2) = (  4.74015273061078E-01,  4.32533852588737E-01)
-X( 3) = (  5.38513586871377E-02, -5.50204920464134E-01)
-X( 4) = ( -8.19811454915227E-02,  4.38684947472842E-01)
-
-X( 5) = ( -1.14224468390391E+00, -5.48249782607621E-01)
-
-PATH NUMBER =      4359
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.24136979146081E-01, -2.33118578769462E-01)
-X( 2) = (  1.98302083108578E-01,  7.28346696520671E-01)
-X( 3) = (  3.94726706810086E-01, -5.64919409421941E-01)
-X( 4) = ( -1.04617913632505E-01,  5.23927686228965E-01)
-
-X( 5) = ( -1.23407144191491E+00,  1.91311358743464E-01)
-
-PATH NUMBER =      4360
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.36821314778127E-01, -6.48859325769521E-02)
-X( 2) = ( -2.03051304814726E-01,  7.77727459489333E-01)
-X( 3) = (  6.65310664220866E-01, -3.57080911700388E-01)
-X( 4) = ( -1.76751660365260E-01,  5.74676778484966E-01)
-
-X( 5) = ( -9.43254217828091E-01,  9.01555435279958E-01)
-
-PATH NUMBER =      4361
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08586886150693E-01, -1.20695197934555E-01)
-X( 2) = ( -5.42247179953473E-01,  5.57570333695637E-01)
-X( 3) = (  7.38993990041257E-01, -2.39393702509964E-02)
-X( 4) = ( -2.64630203916236E-01,  5.67186159960926E-01)
-
-X( 5) = ( -2.27588286357514E-01,  1.41542383731513E+00)
-
-PATH NUMBER =      4362
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.06981769662109E-01, -3.74432599330555E-01)
-X( 2) = ( -6.60572022588000E-01,  1.70889285072361E-01)
-X( 3) = (  5.81299437220949E-01,  2.78624585226245E-01)
-X( 4) = ( -3.27134197096707E-01,  5.04960774313195E-01)
-
-X( 5) = (  8.57915050528328E-01,  1.36186883566719E+00)
-
-PATH NUMBER =      4363
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.09017682826726E-01, -7.07371586674662E-01)
-X( 2) = ( -5.02660323815467E-01, -2.01383326248502E-01)
-X( 3) = (  2.66014039604300E-01,  4.09037917339730E-01)
-X( 4) = ( -3.35017326843027E-01,  4.17116571044476E-01)
-
-X( 5) = (  1.69779159685211E+00,  3.50917915374039E-01)
-
-PATH NUMBER =      4364
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03431773053222E-01, -9.63726307583888E-01)
-X( 2) = ( -1.42400722484586E-01, -3.85057008080703E-01)
-X( 3) = ( -5.93366612569751E-02,  3.06278778610819E-01)
-X( 4) = ( -2.84590989135662E-01,  3.44756829143774E-01)
-
-X( 5) = (  1.36804868656091E+00, -9.86044473228884E-01)
-
-PATH NUMBER =      4365
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.30959136458808E-01, -1.02354553907944E+00)
-X( 2) = (  2.51637310102440E-01, -2.94188803389362E-01)
-X( 3) = ( -2.42517456559616E-01,  1.84293120913846E-02)
-X( 4) = ( -1.99450227814207E-01,  3.21739476035382E-01)
-
-X( 5) = (  2.74083452352730E-01, -1.49312410616945E+00)
-
-PATH NUMBER =      4366
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01649614873174E+00, -8.26758383667949E-01)
-X( 2) = (  5.01822255554965E-01, -1.04985343400145E-01)
-X( 3) = ( -2.70139020476726E-01, -5.43241191508960E-01)
-X( 4) = ( -4.28133429068231E-01,  5.21276564639137E-01)
-
-X( 5) = ( -4.62855310760425E-01, -5.45247142106248E-01)
-
-PATH NUMBER =      4367
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13228112147922E+00, -5.14594397401120E-01)
-X( 2) = (  4.80758529362831E-01,  2.98845464225752E-01)
-X( 3) = ( -1.84716454358420E-02, -7.73623594229440E-01)
-X( 4) = ( -3.90681223224621E-01,  6.01126925063879E-01)
-
-X( 5) = ( -5.80354202794510E-01, -3.49586778381033E-01)
-
-PATH NUMBER =      4368
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02032241388644E+00, -2.01037764509569E-01)
-X( 2) = (  2.05045339410332E-01,  5.94658308157686E-01)
-X( 3) = (  3.22403702687106E-01, -7.88338083187247E-01)
-X( 4) = ( -4.13317991365604E-01,  6.86369663820003E-01)
-
-X( 5) = ( -7.09274047829730E-01, -1.56934045682854E-01)
-
-PATH NUMBER =      4369
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.33006749518485E-01, -3.28051183170590E-02)
-X( 2) = ( -1.96308048512972E-01,  6.44039071126348E-01)
-X( 3) = (  5.92987660097885E-01, -5.80499585465694E-01)
-X( 4) = ( -4.85451738098359E-01,  7.37118756076003E-01)
-
-X( 5) = ( -8.94742001132168E-01,  8.84969982003100E-02)
-
-PATH NUMBER =      4370
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.04772320891052E-01, -8.86143836746621E-02)
-X( 2) = ( -5.35503923651719E-01,  4.23881945332652E-01)
-X( 3) = (  6.66670985918277E-01, -2.47358044016303E-01)
-X( 4) = ( -5.73330281649334E-01,  7.29628137551963E-01)
-
-X( 5) = ( -1.29487369223704E+00,  5.24239480889907E-01)
-
-PATH NUMBER =      4371
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.89203665078249E-01, -3.42351785070662E-01)
-X( 2) = ( -6.53828766286246E-01,  3.72008967093756E-02)
-X( 3) = (  5.08976433097969E-01,  5.52059114609387E-02)
-X( 4) = ( -6.35834274829806E-01,  6.67402751904232E-01)
-
-X( 5) = ( -3.67708343485576E+00,  1.75216092020519E+00)
-
-PATH NUMBER =      4372
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87167751913632E-01, -6.75290772414768E-01)
-X( 2) = ( -4.95917067513713E-01, -3.35071714611488E-01)
-X( 3) = (  1.93691035481321E-01,  1.85619243574424E-01)
-X( 4) = ( -6.43717404576125E-01,  5.79558548635513E-01)
-
-X( 5) = (  1.31167217800884E-01, -3.29169980654188E+00)
-
-PATH NUMBER =      4373
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.99617207793580E-01, -9.31645493323994E-01)
-X( 2) = ( -1.35657466182832E-01, -5.18745396443688E-01)
-X( 3) = ( -1.31659665379955E-01,  8.28601048455125E-02)
-X( 4) = ( -5.93291066868760E-01,  5.07198806734811E-01)
-
-X( 5) = ( -1.20929228220949E-01, -1.29281656178126E+00)
-
-PATH NUMBER =      4374
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.27144571199167E-01, -9.91464724819546E-01)
-X( 2) = (  2.58380566404194E-01, -4.27877191752347E-01)
-X( 3) = ( -3.14840460682596E-01, -2.04989361673921E-01)
-X( 4) = ( -5.08150305547306E-01,  4.84181453626419E-01)
-
-X( 5) = ( -3.26500745352823E-01, -8.03717966613598E-01)
-
-PATH NUMBER =      4375
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18349315032107E+00, -2.57286997566323E-01)
-X( 2) = (  4.23773417038971E-01, -1.81630522275322E-01)
-X( 3) = ( -6.01712187940940E-02, -3.38658900559791E-01)
-X( 4) = ( -7.04591549795363E-01,  1.03350217117436E-02)
-
-X( 5) = ( -6.57667953226582E-01, -7.97230115753418E-03)
-
-PATH NUMBER =      4376
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.29927812306856E+00,  5.48769887005068E-02)
-X( 2) = (  4.02709690846837E-01,  2.22200285350575E-01)
-X( 3) = (  1.91496156246790E-01, -5.69041303280271E-01)
-X( 4) = ( -6.67139343951752E-01,  9.01853821364854E-02)
-
-X( 5) = ( -5.19949265208371E-01,  7.90789183888918E-02)
-
-PATH NUMBER =      4377
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18731941547578E+00,  3.68433621592058E-01)
-X( 2) = (  1.26996500894338E-01,  5.18013129282510E-01)
-X( 3) = (  5.32371504369738E-01, -5.83755792238079E-01)
-X( 4) = ( -6.89776112092735E-01,  1.75428120892609E-01)
-
-X( 5) = ( -4.45102611244234E-01,  1.70380358038856E-01)
-
-PATH NUMBER =      4378
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.00003751107821E-01,  5.36666267784568E-01)
-X( 2) = ( -2.74356887028967E-01,  5.67393892251171E-01)
-X( 3) = (  8.02955461780517E-01, -3.75917294516525E-01)
-X( 4) = ( -7.61909858825490E-01,  2.26177213148610E-01)
-
-X( 5) = ( -4.00084534803098E-01,  2.68762643250317E-01)
-
-PATH NUMBER =      4379
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71769322480388E-01,  4.80857002426964E-01)
-X( 2) = ( -6.13552762167713E-01,  3.47236766457475E-01)
-X( 3) = (  8.76638787600908E-01, -4.27757530671344E-02)
-X( 4) = ( -8.49788402376465E-01,  2.18686594624569E-01)
-
-X( 5) = ( -3.79749853886569E-01,  3.90778268880878E-01)
-
-PATH NUMBER =      4380
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.56200666667585E-01,  2.27119601030965E-01)
-X( 2) = ( -7.31877604802240E-01, -3.94442821658008E-02)
-X( 3) = (  7.18944234780601E-01,  2.59788202410106E-01)
-X( 4) = ( -9.12292395556937E-01,  1.56461208976838E-01)
-
-X( 5) = ( -4.12288263362288E-01,  5.67931641984258E-01)
-
-PATH NUMBER =      4381
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.54164753502969E-01, -1.05819386313141E-01)
-X( 2) = ( -5.73965906029707E-01, -4.11716893486664E-01)
-X( 3) = (  4.03658837163953E-01,  3.90201534523591E-01)
-X( 4) = ( -9.20175525303256E-01,  6.86170057081193E-02)
-
-X( 5) = ( -6.57373333574053E-01,  8.10780945946035E-01)
-
-PATH NUMBER =      4382
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.66614209382917E-01, -3.62174107222367E-01)
-X( 2) = ( -2.13706304698827E-01, -5.95390575318865E-01)
-X( 3) = (  7.83081363026774E-02,  2.87442395794681E-01)
-X( 4) = ( -8.69749187595892E-01, -3.74273619258210E-03)
-
-X( 5) = ( -1.24714215888115E+00,  5.09416111048199E-01)
-
-PATH NUMBER =      4383
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.94141572788503E-01, -4.21993338717919E-01)
-X( 2) = (  1.80331727888199E-01, -5.04522370627524E-01)
-X( 3) = ( -1.04872658999963E-01, -4.07070724752825E-04)
-X( 4) = ( -7.84608426274437E-01, -2.67600893009750E-02)
-
-X( 5) = ( -9.52648396334059E-01, -1.85979170507889E-02)
-
-PATH NUMBER =      4384
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.20333177670914E+00,  3.99694898295761E-02)
-X( 2) = (  5.56601732554887E-01, -1.98204456203268E-01)
-X( 3) = (  1.47294465428331E-01, -4.48679401297343E-01)
-X( 4) = ( -9.18170874685644E-01, -2.65467454809988E-01)
-
-X( 5) = ( -4.69248041063151E-01,  1.04717912937444E-01)
-
-PATH NUMBER =      4385
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.31911674945662E+00,  3.52133476096405E-01)
-X( 2) = (  5.35538006362754E-01,  2.05626351422629E-01)
-X( 3) = (  3.98961840469215E-01, -6.79061804017824E-01)
-X( 4) = ( -8.80718668842033E-01, -1.85617094385246E-01)
-
-X( 5) = ( -3.80301354916953E-01,  1.20536174649793E-01)
-
-PATH NUMBER =      4386
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.20715804186384E+00,  6.65690108987956E-01)
-X( 2) = (  2.59824816410254E-01,  5.01439195354564E-01)
-X( 3) = (  7.39837188592163E-01, -6.93776292975631E-01)
-X( 4) = ( -9.03355436983015E-01, -1.00374355629123E-01)
-
-X( 5) = ( -3.25360157133784E-01,  1.60956998485326E-01)
-
-PATH NUMBER =      4387
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.19842377495884E-01,  8.33922755180466E-01)
-X( 2) = ( -1.41528571513051E-01,  5.50819958323226E-01)
-X( 3) = (  1.01042114600294E+00, -4.85937795254078E-01)
-X( 4) = ( -9.75489183715771E-01, -4.96252633731215E-02)
-
-X( 5) = ( -2.92397385957677E-01,  2.13329800601180E-01)
-
-PATH NUMBER =      4388
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.91607948868451E-01,  7.78113489822862E-01)
-X( 2) = ( -4.80724446651797E-01,  3.30662832529529E-01)
-X( 3) = (  1.08410447182333E+00, -1.52796253804687E-01)
-X( 4) = ( -1.06336772726675E+00, -5.71158818971616E-02)
-
-X( 5) = ( -2.79711239478746E-01,  2.79540745656292E-01)
-
-PATH NUMBER =      4389
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.76039293055648E-01,  5.24376088426863E-01)
-X( 2) = ( -5.99049289286325E-01, -5.60182160937466E-02)
-X( 3) = (  9.26409919003026E-01,  1.49767701672554E-01)
-X( 4) = ( -1.12587172044722E+00, -1.19341267544893E-01)
-
-X( 5) = ( -3.02447011566020E-01,  3.64828223108609E-01)
-
-PATH NUMBER =      4390
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.74003379891032E-01,  1.91437101082756E-01)
-X( 2) = ( -4.41137590513792E-01, -4.28290827414609E-01)
-X( 3) = (  6.11124521386378E-01,  2.80181033786039E-01)
-X( 4) = ( -1.13375485019354E+00, -2.07185470813611E-01)
-
-X( 5) = ( -4.09721827659969E-01,  4.47479424144827E-01)
-
-PATH NUMBER =      4391
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.86452835770980E-01, -6.49176198264694E-02)
-X( 2) = ( -8.08779891829108E-02, -6.11964509246811E-01)
-X( 3) = (  2.85773820525102E-01,  1.77421895057128E-01)
-X( 4) = ( -1.08332851248617E+00, -2.79545212714313E-01)
-
-X( 5) = ( -5.98977834096023E-01,  3.76411533331718E-01)
-
-PATH NUMBER =      4392
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.13980199176566E-01, -1.24736851322021E-01)
-X( 2) = (  3.13160043404115E-01, -5.21096304555470E-01)
-X( 3) = (  1.02593025222462E-01, -1.10427571462305E-01)
-X( 4) = ( -9.98187751164718E-01, -3.02562565822706E-01)
-
-X( 5) = ( -5.91917665824374E-01,  1.71220148326999E-01)
-
-PATH NUMBER =      4393
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02745625921580E+00,  2.80433193415717E-01)
-X( 2) = (  6.69007644917356E-01, -1.25520430760227E-01)
-X( 3) = (  3.76942214650404E-01, -3.99603623263198E-01)
-X( 4) = ( -9.04499715053914E-01, -6.14030553072601E-01)
-
-X( 5) = ( -3.65890746805823E-01,  1.97302335229922E-01)
-
-PATH NUMBER =      4394
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14324123196328E+00,  5.92597179682546E-01)
-X( 2) = (  6.47943918725222E-01,  2.78310376865671E-01)
-X( 3) = (  6.28609589691288E-01, -6.29986025983678E-01)
-X( 4) = ( -8.67047509210303E-01, -5.34180192647859E-01)
-
-X( 5) = ( -3.01101080642385E-01,  1.75795655550111E-01)
-
-PATH NUMBER =      4395
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03128252437050E+00,  9.06153812574097E-01)
-X( 2) = (  3.72230728772723E-01,  5.74123220797605E-01)
-X( 3) = (  9.69484937814236E-01, -6.44700514941485E-01)
-X( 4) = ( -8.89684277351286E-01, -4.48937453891735E-01)
-
-X( 5) = ( -2.51005650603157E-01,  1.87550028083178E-01)
-
-PATH NUMBER =      4396
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.43966860002546E-01,  1.07438645876661E+00)
-X( 2) = ( -2.91226591505824E-02,  6.23503983766267E-01)
-X( 3) = (  1.24006889522501E+00, -4.36862017219931E-01)
-X( 4) = ( -9.61818024084040E-01, -3.98188361635734E-01)
-
-X( 5) = ( -2.15781693382053E-01,  2.15578628095550E-01)
-
-PATH NUMBER =      4397
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.15732431375114E-01,  1.01857719340900E+00)
-X( 2) = ( -3.68318534289329E-01,  4.03346857972570E-01)
-X( 3) = (  1.31375222104541E+00, -1.03720475770541E-01)
-X( 4) = ( -1.04969656763502E+00, -4.05678980159774E-01)
-
-X( 5) = ( -1.94375043122995E-01,  2.56568362254647E-01)
-
-PATH NUMBER =      4398
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.00163775562311E-01,  7.64839792013003E-01)
-X( 2) = ( -4.86643376923856E-01,  1.66658093492943E-02)
-X( 3) = (  1.15605766822510E+00,  1.98843479706700E-01)
-X( 4) = ( -1.11220056081549E+00, -4.67904365807505E-01)
-
-X( 5) = ( -1.93592346868576E-01,  3.12264165632646E-01)
-
-PATH NUMBER =      4399
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.98127862397695E-01,  4.31900804668897E-01)
-X( 2) = ( -3.28731678151323E-01, -3.55606801971568E-01)
-X( 3) = (  8.40772270608450E-01,  3.29256811820185E-01)
-X( 4) = ( -1.12008369056181E+00, -5.55748569076223E-01)
-
-X( 5) = ( -2.36881354989164E-01,  3.75787380621382E-01)
-
-PATH NUMBER =      4400
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.10577318277643E-01,  1.75546083759672E-01)
-X( 2) = (  3.15279231795576E-02, -5.39280483803770E-01)
-X( 3) = (  5.15421569747175E-01,  2.26497673091274E-01)
-X( 4) = ( -1.06965735285444E+00, -6.28108310976926E-01)
-
-X( 5) = ( -3.44723055210739E-01,  3.86767944570066E-01)
-
-PATH NUMBER =      4401
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.38104681683229E-01,  1.15726852264121E-01)
-X( 2) = (  4.25565955766584E-01, -4.48412279112428E-01)
-X( 3) = (  3.32240774444534E-01, -6.13517934281596E-02)
-X( 4) = ( -9.84516591532989E-01, -6.51125664085319E-01)
-
-X( 5) = ( -4.10619030558858E-01,  2.84253146316403E-01)
-
-PATH NUMBER =      4402
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.38160707114846E-01,  3.51588473827765E-01)
-X( 2) = (  7.08395178479416E-01,  2.41189075603881E-03)
-X( 3) = (  5.21317294760678E-01, -2.14394668416050E-01)
-X( 4) = ( -6.69974958429877E-01, -8.72257725551687E-01)
-
-X( 5) = ( -2.89748044474146E-01,  2.87080574194375E-01)
-
-PATH NUMBER =      4403
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.53945679862331E-01,  6.63752460094595E-01)
-X( 2) = (  6.87331452287282E-01,  4.06242698381936E-01)
-X( 3) = (  7.72984669801562E-01, -4.44777071136531E-01)
-X( 4) = ( -6.32522752586266E-01, -7.92407365126946E-01)
-
-X( 5) = ( -2.46172724526063E-01,  2.37831668657463E-01)
-
-PATH NUMBER =      4404
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.41986972269547E-01,  9.77309092986145E-01)
-X( 2) = (  4.11618262334782E-01,  7.02055542313871E-01)
-X( 3) = (  1.11386001792451E+00, -4.59491560094338E-01)
-X( 4) = ( -6.55159520727249E-01, -7.07164626370822E-01)
-
-X( 5) = ( -1.98682239504027E-01,  2.27219772422795E-01)
-
-PATH NUMBER =      4405
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.54671307901593E-01,  1.14554173917866E+00)
-X( 2) = (  1.02648744114776E-02,  7.51436305282533E-01)
-X( 3) = (  1.38444397533529E+00, -2.51653062372784E-01)
-X( 4) = ( -7.27293267460004E-01, -6.56415534114821E-01)
-
-X( 5) = ( -1.59400516794558E-01,  2.37920202111659E-01)
-
-PATH NUMBER =      4406
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26436879274160E-01,  1.08973247382105E+00)
-X( 2) = ( -3.28931000727269E-01,  5.31279179488836E-01)
-X( 3) = (  1.45812730115568E+00,  8.14884790766068E-02)
-X( 4) = ( -8.15171811010979E-01, -6.63906152638861E-01)
-
-X( 5) = ( -1.29165702662779E-01,  2.63460047798624E-01)
-
-PATH NUMBER =      4407
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.91317765386421E-02,  8.35995072425052E-01)
-X( 2) = ( -4.47255843361796E-01,  1.44598130865560E-01)
-X( 3) = (  1.30043274833537E+00,  3.84052434553847E-01)
-X( 4) = ( -8.77675804191451E-01, -7.26131538286591E-01)
-
-X( 5) = ( -1.11252998440749E-01,  3.04530576002654E-01)
-
-PATH NUMBER =      4408
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.11676897032585E-02,  5.03056085080946E-01)
-X( 2) = ( -2.89344144589263E-01, -2.27674480455303E-01)
-X( 3) = (  9.85147350718724E-01,  5.14465766667332E-01)
-X( 4) = ( -8.85558933937771E-01, -8.13975741555311E-01)
-
-X( 5) = ( -1.20020324153210E-01,  3.62123546251790E-01)
-
-PATH NUMBER =      4409
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21281766176689E-01,  2.46701364171720E-01)
-X( 2) = (  7.09154567416177E-02, -4.11348162287504E-01)
-X( 3) = (  6.59796649857449E-01,  4.11706627938421E-01)
-X( 4) = ( -8.35132596230406E-01, -8.86335483456013E-01)
-
-X( 5) = ( -1.84474580220996E-01,  4.11130616528205E-01)
-
-PATH NUMBER =      4410
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.48809129582275E-01,  1.86882132676169E-01)
-X( 2) = (  4.64953489328644E-01, -3.20479957596163E-01)
-X( 3) = (  4.76615854554808E-01,  1.23857161418988E-01)
-X( 4) = ( -7.49991834908951E-01, -9.09352836564405E-01)
-
-X( 5) = ( -2.77126990769790E-01,  3.75909002217289E-01)
-
-PATH NUMBER =      4411
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.70809724396238E-01,  2.20140984558067E-01)
-X( 2) = (  6.56334468543704E-01,  1.25731553298689E-01)
-X( 3) = (  5.12865001225270E-01,  2.02861349028659E-02)
-X( 4) = ( -3.24333344890257E-01, -9.19321608368935E-01)
-
-X( 5) = ( -2.20422684806637E-01,  3.94710647318548E-01)
-
-PATH NUMBER =      4412
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.86594697143723E-01,  5.32304970824896E-01)
-X( 2) = (  6.35270742351570E-01,  5.29562360924587E-01)
-X( 3) = (  7.64532376266154E-01, -2.10096267817614E-01)
-X( 4) = ( -2.86881139046646E-01, -8.39471247944193E-01)
-
-X( 5) = ( -2.03520086084635E-01,  3.16406752455763E-01)
-
-PATH NUMBER =      4413
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.74635989550939E-01,  8.45861603716447E-01)
-X( 2) = (  3.59557552399071E-01,  8.25375204856521E-01)
-X( 3) = (  1.10540772438910E+00, -2.24810756775421E-01)
-X( 4) = ( -3.09517907187628E-01, -7.54228509188070E-01)
-
-X( 5) = ( -1.58225471653704E-01,  2.81454092057639E-01)
-
-PATH NUMBER =      4414
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87320325182985E-01,  1.01409424990896E+00)
-X( 2) = ( -4.17958355242345E-02,  8.74755967825183E-01)
-X( 3) = (  1.37599168179988E+00, -1.69722590538674E-02)
-X( 4) = ( -3.81651653920383E-01, -7.03479416932069E-01)
-
-X( 5) = ( -1.13407850835596E-01,  2.75150100778608E-01)
-
-PATH NUMBER =      4415
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.40914103444448E-01,  9.58284984551354E-01)
-X( 2) = ( -3.80991710662981E-01,  6.54598842031487E-01)
-X( 3) = (  1.44967500762027E+00,  3.16169282395523E-01)
-X( 4) = ( -4.69530197471358E-01, -7.10970035456109E-01)
-
-X( 5) = ( -7.36532626961592E-02,  2.87325237977599E-01)
-
-PATH NUMBER =      4416
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.56482759257250E-01,  7.04547583155353E-01)
-X( 2) = ( -4.99316553297508E-01,  2.67917793408211E-01)
-X( 3) = (  1.29198045479996E+00,  6.18733237872764E-01)
-X( 4) = ( -5.32034190651831E-01, -7.73195421103839E-01)
-
-X( 5) = ( -4.04019035533113E-02,  3.17147038791269E-01)
-
-PATH NUMBER =      4417
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.58518672421866E-01,  3.71608595811247E-01)
-X( 2) = ( -3.41404854524975E-01, -1.04354817912652E-01)
-X( 3) = (  9.76695057183316E-01,  7.49146569986248E-01)
-X( 4) = ( -5.39917320398150E-01, -8.61039624372558E-01)
-
-X( 5) = ( -2.21820007462546E-02,  3.69887579270216E-01)
-
-PATH NUMBER =      4418
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.46069216541918E-01,  1.15253874902022E-01)
-X( 2) = (  1.88547468059056E-02, -2.88028499744854E-01)
-X( 3) = (  6.51344356322041E-01,  6.46387431257337E-01)
-X( 4) = ( -4.89490982690785E-01, -9.33399366273260E-01)
-
-X( 5) = ( -4.87340426528172E-02,  4.42998273270673E-01)
-
-PATH NUMBER =      4419
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.81458146863668E-01,  5.54346434064706E-02)
-X( 2) = (  4.12892779392932E-01, -1.97160295053512E-01)
-X( 3) = (  4.68163561019401E-01,  3.58537964737904E-01)
-X( 4) = ( -4.04350221369331E-01, -9.56416719381653E-01)
-
-X( 5) = ( -1.48501541207816E-01,  4.71593390991842E-01)
-
-PATH NUMBER =      4420
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.50499807149217E-01, -5.24035332879680E-02)
-X( 2) = (  5.37185299879481E-01,  1.86735916218634E-01)
-X( 3) = (  3.55540256126177E-01,  1.94629030634026E-01)
-X( 4) = ( -2.93044267888866E-02, -7.33200487697359E-01)
-
-X( 5) = ( -1.48267285812661E-01,  5.62400005276726E-01)
-
-PATH NUMBER =      4421
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.66284779896702E-01,  2.59760452978861E-01)
-X( 2) = (  5.16121573687347E-01,  5.90566723844532E-01)
-X( 3) = (  6.07207631167061E-01, -3.57533720864540E-02)
-X( 4) = (  8.14777905472400E-03, -6.53350127272617E-01)
-
-X( 5) = ( -1.77087376892432E-01,  4.36593953993215E-01)
-
-PATH NUMBER =      4422
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.54326072303918E-01,  5.73317085870412E-01)
-X( 2) = (  2.40408383734848E-01,  8.86379567776466E-01)
-X( 3) = (  9.48082979290009E-01, -5.04678610442609E-02)
-X( 4) = ( -1.44889890862584E-02, -5.68107388516493E-01)
-
-X( 5) = ( -1.31366026004683E-01,  3.63922923876238E-01)
-
-PATH NUMBER =      4423
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.70104079359641E-02,  7.41549732062922E-01)
-X( 2) = ( -1.60945004188456E-01,  9.35760330745128E-01)
-X( 3) = (  1.21866693670079E+00,  1.57370636677292E-01)
-X( 4) = ( -8.66227358190135E-02, -5.17358296260493E-01)
-
-X( 5) = ( -7.56479250539820E-02,  3.35302386522276E-01)
-
-PATH NUMBER =      4424
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.61224020691469E-01,  6.85740466705318E-01)
-X( 2) = ( -5.00140879327203E-01,  7.15603204951431E-01)
-X( 3) = (  1.29235026252118E+00,  4.90512178126683E-01)
-X( 4) = ( -1.74501279369989E-01, -5.24848914784533E-01)
-
-X( 5) = ( -2.18342868156330E-02,  3.32222085103368E-01)
-
-PATH NUMBER =      4425
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.76792676504272E-01,  4.32003065309318E-01)
-X( 2) = ( -6.18465721961730E-01,  3.28922156328155E-01)
-X( 3) = (  1.13465570970087E+00,  7.93076133603924E-01)
-X( 4) = ( -2.37005272550461E-01, -5.87074300432264E-01)
-
-X( 5) = (  3.02663936467001E-02,  3.50234198561448E-01)
-
-PATH NUMBER =      4426
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.78828589668888E-01,  9.90640779652124E-02)
-X( 2) = ( -4.60554023189197E-01, -4.33504549927076E-02)
-X( 3) = (  8.19370312084223E-01,  9.23489465717409E-01)
-X( 4) = ( -2.44888402296780E-01, -6.74918503700982E-01)
-
-X( 5) = (  7.83302628421254E-02,  3.96886979114336E-01)
-
-PATH NUMBER =      4427
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.66379133788940E-01, -1.57290642944013E-01)
-X( 2) = ( -1.00294421858317E-01, -2.27024136824909E-01)
-X( 3) = (  4.94019611222948E-01,  8.20730326988498E-01)
-X( 4) = ( -1.94462064589416E-01, -7.47278245601684E-01)
-
-X( 5) = (  9.86060275728158E-02,  4.89925463418911E-01)
-
-PATH NUMBER =      4428
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.11482296166462E-02, -2.17109874439565E-01)
-X( 2) = (  2.93743610728710E-01, -1.36155932133567E-01)
-X( 3) = (  3.10838815920308E-01,  5.32880860469064E-01)
-X( 4) = ( -1.09321303267961E-01, -7.70295598710077E-01)
-
-X( 5) = (  1.18529929557954E-02,  6.01999441536858E-01)
-
-PATH NUMBER =      4429
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.33525302749455E-01, -3.38518470815262E-01)
-X( 2) = (  4.06698892700247E-01,  1.56880360117657E-01)
-X( 3) = (  1.22957056165046E-01,  2.27057040259363E-01)
-X( 4) = (  7.70644862134095E-02, -4.00982504405036E-01)
-
-X( 5) = ( -1.08947288410448E-01,  9.44169471431874E-01)
-
-PATH NUMBER =      4430
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.49310275496940E-01, -2.63544845484330E-02)
-X( 2) = (  3.85635166508113E-01,  5.60711167743555E-01)
-X( 3) = (  3.74624431205929E-01, -3.32536246111714E-03)
-X( 4) = (  1.14516692057020E-01, -3.21132143980295E-01)
-
-X( 5) = ( -2.33990751800680E-01,  6.57752787032899E-01)
-
-PATH NUMBER =      4431
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.37351567904156E-01,  2.87202148343118E-01)
-X( 2) = (  1.09921976555613E-01,  8.56524011675489E-01)
-X( 3) = (  7.15499779328877E-01, -1.80398514189240E-02)
-X( 4) = (  9.18799239160376E-02, -2.35889405224171E-01)
-
-X( 5) = ( -1.55381704591673E-01,  5.03385738833507E-01)
-
-PATH NUMBER =      4432
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.50035903536202E-01,  4.55434794535628E-01)
-X( 2) = ( -2.91431411367691E-01,  9.05904774644151E-01)
-X( 3) = (  9.86083736739656E-01,  1.89798646302629E-01)
-X( 4) = (  1.97461771832825E-02, -1.85140312968170E-01)
-
-X( 5) = ( -6.40646656967575E-02,  4.41021838512812E-01)
-
-PATH NUMBER =      4433
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.78198525091231E-01,  3.99625529178024E-01)
-X( 2) = ( -6.30627286506437E-01,  6.85747648850455E-01)
-X( 3) = (  1.05976706256005E+00,  5.22940187752020E-01)
-X( 4) = ( -6.81323663676927E-02, -1.92630931492210E-01)
-
-X( 5) = (  2.12616183853509E-02,  4.19131678279858E-01)
-
-PATH NUMBER =      4434
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.93767180904033E-01,  1.45888127782024E-01)
-X( 2) = ( -7.48952129140965E-01,  2.99066600227178E-01)
-X( 3) = (  9.02072509739740E-01,  8.25504143229261E-01)
-X( 4) = ( -1.30636359548165E-01, -2.54856317139941E-01)
-
-X( 5) = (  1.07563702819945E-01,  4.23813352094219E-01)
-
-PATH NUMBER =      4435
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.95803094068650E-01, -1.87050859562081E-01)
-X( 2) = ( -5.91040430368432E-01, -7.32060110936841E-02)
-X( 3) = (  5.86787112123092E-01,  9.55917475342745E-01)
-X( 4) = ( -1.38519489294484E-01, -3.42700520408660E-01)
-
-X( 5) = (  2.04063594459424E-01,  4.63265185559318E-01)
-
-PATH NUMBER =      4436
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.83353638188702E-01, -4.43405580471308E-01)
-X( 2) = ( -2.30780829037551E-01, -2.56879692925885E-01)
-X( 3) = (  2.61436411261817E-01,  8.53158336613835E-01)
-X( 4) = ( -8.80931515871196E-02, -4.15060262309362E-01)
-
-X( 5) = (  3.07792959047369E-01,  5.80728449749799E-01)
-
-PATH NUMBER =      4437
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.44173725216884E-01, -5.03224811966859E-01)
-X( 2) = (  1.63257203549475E-01, -1.66011488234544E-01)
-X( 3) = (  7.82556159591764E-02,  5.65308870094401E-01)
-X( 4) = ( -2.95239026566495E-03, -4.38077615417754E-01)
-
-X( 5) = (  2.89349230197393E-01,  8.61436248028148E-01)
-
-PATH NUMBER =      4438
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.81037659080000E-01, -5.04327468941463E-01)
-X( 2) = (  3.25931287120043E-01,  5.01346315029523E-02)
-X( 3) = ( -7.60563345219719E-02,  1.02396737677999E-01)
-X( 4) = ( -5.49978024359301E-02, -7.81161450660575E-02)
-
-X( 5) = ( -1.30125537775607E+00,  1.74785121653757E+00)
-
-PATH NUMBER =      4439
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.96822631827485E-01, -1.92163482674633E-01)
-X( 2) = (  3.04867560927909E-01,  4.53965439128850E-01)
-X( 3) = (  1.75611040518912E-01, -1.27985665042481E-01)
-X( 4) = ( -1.75455965923196E-02,  1.73421535868452E-03)
-
-X( 5) = ( -7.42254693890833E-01,  7.87827620345598E-01)
-
-PATH NUMBER =      4440
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.84863924234701E-01,  1.21393150216917E-01)
-X( 2) = (  2.91543709754097E-02,  7.49778283060784E-01)
-X( 3) = (  5.16486388641860E-01, -1.42700154000288E-01)
-X( 4) = ( -4.01823647333022E-02,  8.69769541148082E-02)
-
-X( 5) = ( -3.96118993339406E-01,  6.31210656361249E-01)
-
-PATH NUMBER =      4441
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.97548259866748E-01,  2.89625796409428E-01)
-X( 2) = ( -3.72199016947895E-01,  7.99159046029446E-01)
-X( 3) = (  7.87070346052639E-01,  6.51383437212645E-02)
-X( 4) = ( -1.12316111466057E-01,  1.37726046370809E-01)
-
-X( 5) = ( -1.82454551173123E-01,  5.91612065591343E-01)
-
-PATH NUMBER =      4442
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.93138312393144E-02,  2.33816531051824E-01)
-X( 2) = ( -7.11394892086642E-01,  5.79001920235750E-01)
-X( 3) = (  8.60753671873030E-01,  3.98279885170655E-01)
-X( 4) = ( -2.00194655017033E-01,  1.30235427846769E-01)
-
-X( 5) = ( -1.12833096944622E-02,  5.87102778094037E-01)
-
-PATH NUMBER =      4443
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.46254824573488E-01, -1.99208703441753E-02)
-X( 2) = ( -8.29719734721168E-01,  1.92320871612474E-01)
-X( 3) = (  7.03059119052723E-01,  7.00843840647896E-01)
-X( 4) = ( -2.62698648197505E-01,  6.80100421990376E-02)
-
-X( 5) = (  1.61223690067536E-01,  6.06661092946295E-01)
-
-PATH NUMBER =      4444
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.48290737738105E-01, -3.52859857688282E-01)
-X( 2) = ( -6.71808035948636E-01, -1.79951739708389E-01)
-X( 3) = (  3.87773721436075E-01,  8.31257172761381E-01)
-X( 4) = ( -2.70581777943824E-01, -1.98341610696815E-02)
-
-X( 5) = (  3.80000055716706E-01,  6.68346972643700E-01)
-
-PATH NUMBER =      4445
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.41587181418432E-02, -6.09214578597507E-01)
-X( 2) = ( -3.11548434617755E-01, -3.63625421540590E-01)
-X( 3) = (  6.24230205747997E-02,  7.28498034032470E-01)
-X( 4) = ( -2.20155440236459E-01, -9.21939029703830E-02)
-
-X( 5) = (  7.37805751014032E-01,  8.80535560382167E-01)
-
-PATH NUMBER =      4446
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.91686081547429E-01, -6.69033810093059E-01)
-X( 2) = (  8.24895979692711E-02, -2.72757216849249E-01)
-X( 3) = ( -1.20757774727841E-01,  4.40648567513037E-01)
-X( 4) = ( -1.35014678915005E-01, -1.15211256078776E-01)
-
-X( 5) = (  1.13986982365405E+00,  2.11859070649727E+00)
-
-PATH NUMBER =      4447
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.77223093820358E-01, -4.72246654681569E-01)
-X( 2) = (  3.32674543421797E-01, -8.35537568600335E-02)
-X( 3) = ( -1.48379338644952E-01, -1.21021936087307E-01)
-X( 4) = ( -3.63697880169029E-01,  8.43258325249794E-02)
-
-X( 5) = ( -1.20467811763066E+00, -7.57070747010825E-02)
-
-PATH NUMBER =      4448
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09300806656784E+00, -1.60082668414740E-01)
-X( 2) = (  3.11610817229663E-01,  3.20277050765864E-01)
-X( 3) = (  1.03288036395932E-01, -3.51404338807787E-01)
-X( 4) = ( -3.26245674325419E-01,  1.64176192949721E-01)
-
-X( 5) = ( -8.06452424217962E-01,  1.71555685599864E-01)
-
-PATH NUMBER =      4449
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.81049358975060E-01,  1.53473964476811E-01)
-X( 2) = (  3.58976272771636E-02,  6.16089894697799E-01)
-X( 3) = (  4.44163384518880E-01, -3.66118827765594E-01)
-X( 4) = ( -3.48882442466401E-01,  2.49418931705845E-01)
-
-X( 5) = ( -5.98219378848183E-01,  3.38573534984565E-01)
-
-PATH NUMBER =      4450
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.93733694607106E-01,  3.21706610669321E-01)
-X( 2) = ( -3.65455760646141E-01,  6.65470657666461E-01)
-X( 3) = (  7.14747341929659E-01, -1.58280330044041E-01)
-X( 4) = ( -4.21016189199156E-01,  3.00168023961846E-01)
-
-X( 5) = ( -4.43349635071243E-01,  4.84128258267876E-01)
-
-PATH NUMBER =      4451
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.65499265979672E-01,  2.65897345311718E-01)
-X( 2) = ( -7.04651635784888E-01,  4.45313531872764E-01)
-X( 3) = (  7.88430667750050E-01,  1.74861211405350E-01)
-X( 4) = ( -5.08894732750131E-01,  2.92677405437805E-01)
-
-X( 5) = ( -2.94543432381224E-01,  6.45215512282589E-01)
-
-PATH NUMBER =      4452
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.49930610166870E-01,  1.21599439157181E-02)
-X( 2) = ( -8.22976478419415E-01,  5.86324832494883E-02)
-X( 3) = (  6.30736114929743E-01,  4.77425166882591E-01)
-X( 4) = ( -5.71398725930603E-01,  2.30452019790074E-01)
-
-X( 5) = ( -1.12725086437041E-01,  8.78745472584713E-01)
-
-PATH NUMBER =      4453
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.47894697002254E-01, -3.20779043428388E-01)
-X( 2) = ( -6.65064779646882E-01, -3.13640128071375E-01)
-X( 3) = (  3.15450717313095E-01,  6.07838498996075E-01)
-X( 4) = ( -5.79281855676923E-01,  1.42607816521356E-01)
-
-X( 5) = (  1.75590283715207E-01,  1.38491767916256E+00)
-
-PATH NUMBER =      4454
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.60344152882202E-01, -5.77133764337614E-01)
-X( 2) = ( -3.04805178316001E-01, -4.97313809903576E-01)
-X( 3) = ( -9.89998354818038E-03,  5.05079360267165E-01)
-X( 4) = ( -5.28855517969558E-01,  7.02480746206540E-02)
-
-X( 5) = (  1.02875943724169E-01,  4.04337760491148E+00)
-
-PATH NUMBER =      4455
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.87871516287787E-01, -6.36952995833165E-01)
-X( 2) = (  8.92328542710248E-02, -4.06445605212235E-01)
-X( 3) = ( -1.93080778850821E-01,  2.17229893747731E-01)
-X( 4) = ( -4.43714756648104E-01,  4.72307215122611E-02)
-
-X( 5) = ( -2.74697828755427E+00, -4.17001626505995E-01)
-
-PATH NUMBER =      4456
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11932295468443E+00, -2.65510674284537E-01)
-X( 2) = (  6.26130200694943E-01,  3.80668856012519E-02)
-X( 3) = ( -5.82030381214600E-01, -2.55769609379168E-01)
-X( 4) = ( -4.42395116269924E-01,  9.11209856207296E-03)
-
-X( 5) = ( -1.14804831252444E+00,  6.23436742717623E-01)
-
-PATH NUMBER =      4457
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23510792743191E+00,  4.66533119822922E-02)
-X( 2) = (  6.05066474502809E-01,  4.41897693227149E-01)
-X( 3) = ( -3.30363006173716E-01, -4.86152012099648E-01)
-X( 4) = ( -4.04942910426313E-01,  8.89624589868148E-02)
-
-X( 5) = ( -6.81861939881766E-01,  4.42359613550454E-01)
-
-PATH NUMBER =      4458
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12314921983913E+00,  3.60209944873843E-01)
-X( 2) = (  3.29353284550310E-01,  7.37710537159084E-01)
-X( 3) = (  1.05123419492319E-02, -5.00866501057455E-01)
-X( 4) = ( -4.27579678567296E-01,  1.74205197742939E-01)
-
-X( 5) = ( -4.40906411738144E-01,  4.49586731226121E-01)
-
-PATH NUMBER =      4459
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.35833555471174E-01,  5.28442591066353E-01)
-X( 2) = ( -7.20001033729950E-02,  7.87091300127746E-01)
-X( 3) = (  2.81096299360011E-01, -2.93028003335902E-01)
-X( 4) = ( -4.99713425300051E-01,  2.24954289998939E-01)
-
-X( 5) = ( -2.78665040069161E-01,  4.90866644625604E-01)
-
-PATH NUMBER =      4460
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07599126843740E-01,  4.72633325708750E-01)
-X( 2) = ( -4.11195978511742E-01,  5.66934174334049E-01)
-X( 3) = (  3.54779625180402E-01,  4.01135381134895E-02)
-X( 4) = ( -5.87591968851026E-01,  2.17463671474899E-01)
-
-X( 5) = ( -1.40253069304435E-01,  5.52701401293420E-01)
-
-PATH NUMBER =      4461
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.92030471030938E-01,  2.18895924312751E-01)
-X( 2) = ( -5.29520821146269E-01,  1.80253125710773E-01)
-X( 3) = (  1.97085072360095E-01,  3.42677493590730E-01)
-X( 4) = ( -6.50095962031499E-01,  1.55238285827168E-01)
-
-X( 5) = (  4.46194115872743E-03,  6.50665909876371E-01)
-
-PATH NUMBER =      4462
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.89994557866321E-01, -1.14043063031356E-01)
-X( 2) = ( -3.71609122373736E-01, -1.92019485610090E-01)
-X( 3) = ( -1.18200325256554E-01,  4.73090825704215E-01)
-X( 4) = ( -6.57979091777818E-01,  6.73940825584488E-02)
-
-X( 5) = (  1.83402541778543E-01,  8.46891391825881E-01)
-
-PATH NUMBER =      4463
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.02444013746269E-01, -3.70397783940582E-01)
-X( 2) = ( -1.13495210428553E-02, -3.75693167442291E-01)
-X( 3) = ( -4.43551026117829E-01,  3.70331686975304E-01)
-X( 4) = ( -6.07552754070453E-01, -4.96565934225280E-03)
-
-X( 5) = (  3.43429084808155E-01,  1.42216235798457E+00)
-
-PATH NUMBER =      4464
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.29971377151855E-01, -4.30217015436133E-01)
-X( 2) = (  3.82688511544171E-01, -2.84824962750950E-01)
-X( 3) = ( -6.26731821420469E-01,  8.24822204558710E-02)
-X( 4) = ( -5.22411992748998E-01, -2.79830124506454E-02)
-
-X( 5) = ( -1.16838752465760E+00,  2.10431161833793E+00)
-
-PATH NUMBER =      4465
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13916158107249E+00,  3.17458131113607E-02)
-X( 2) = (  7.58958516210859E-01,  2.14929516733056E-02)
-X( 3) = ( -3.74564696992175E-01, -3.65790110116720E-01)
-X( 4) = ( -6.55974441160205E-01, -2.66690377959658E-01)
-
-X( 5) = ( -5.63541712977353E-01,  3.98809849477801E-01)
-
-PATH NUMBER =      4466
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25494655381997E+00,  3.43909799378190E-01)
-X( 2) = (  7.37894790018724E-01,  4.25323759299203E-01)
-X( 3) = ( -1.22897321951291E-01, -5.96172512837200E-01)
-X( 4) = ( -6.18522235316594E-01, -1.86840017534916E-01)
-
-X( 5) = ( -4.19061044278590E-01,  3.10132367537799E-01)
-
-PATH NUMBER =      4467
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14298784622719E+00,  6.57466432269741E-01)
-X( 2) = (  4.62181600066225E-01,  7.21136603231138E-01)
-X( 3) = (  2.17978026171657E-01, -6.10887001795007E-01)
-X( 4) = ( -6.41159003457577E-01, -1.01597278778792E-01)
-
-X( 5) = ( -3.11461480541954E-01,  3.08322583105219E-01)
-
-PATH NUMBER =      4468
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.55672181859236E-01,  8.25699078462251E-01)
-X( 2) = (  6.08282121429205E-02,  7.70517366199799E-01)
-X( 3) = (  4.88561983582436E-01, -4.03048504073454E-01)
-X( 4) = ( -7.13292750190332E-01, -5.08481865227920E-02)
-
-X( 5) = ( -2.32074992076891E-01,  3.37323352048929E-01)
-
-PATH NUMBER =      4469
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.27437753231803E-01,  7.69889813104648E-01)
-X( 2) = ( -2.78367662995826E-01,  5.50360240406103E-01)
-X( 3) = (  5.62245309402827E-01, -6.99069626240625E-02)
-X( 4) = ( -8.01171293741307E-01, -5.83388050468321E-02)
-
-X( 5) = ( -1.68040778421247E-01,  3.87730250842111E-01)
-
-PATH NUMBER =      4470
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.11869097419001E-01,  5.16152411708648E-01)
-X( 2) = ( -3.96692505630353E-01,  1.63679191782827E-01)
-X( 3) = (  4.04550756582520E-01,  2.32656992853178E-01)
-X( 4) = ( -8.63675286921779E-01, -1.20564190694563E-01)
-
-X( 5) = ( -1.16559751877013E-01,  4.68974693134683E-01)
-
-PATH NUMBER =      4471
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.09833184254384E-01,  1.83213424364542E-01)
-X( 2) = ( -2.38780806857820E-01, -2.08593419538036E-01)
-X( 3) = (  8.92653589658712E-02,  3.63070324966663E-01)
-X( 4) = ( -8.71558416668098E-01, -2.08408393963282E-01)
-
-X( 5) = ( -1.00984004265084E-01,  6.08501642653315E-01)
-
-PATH NUMBER =      4472
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.22282640134332E-01, -7.31412965446842E-02)
-X( 2) = (  1.21478794473060E-01, -3.92267101370237E-01)
-X( 3) = ( -2.36085341895404E-01,  2.60311186237752E-01)
-X( 4) = ( -8.21132078960733E-01, -2.80768135863983E-01)
-
-X( 5) = ( -2.47309154667383E-01,  8.04359643754832E-01)
-
-PATH NUMBER =      4473
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.49810003539918E-01, -1.32960528040235E-01)
-X( 2) = (  5.15516827060087E-01, -3.01398896678895E-01)
-X( 3) = ( -4.19266137198045E-01, -2.75382802816816E-02)
-X( 4) = ( -7.35991317639279E-01, -3.03785488972376E-01)
-
-X( 5) = ( -5.91460695971380E-01,  6.93996642739517E-01)
-
-PATH NUMBER =      4474
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.63286063579152E-01,  2.72209516697503E-01)
-X( 2) = (  8.71364428573327E-01,  9.41769771163469E-02)
-X( 3) = ( -1.44916947770102E-01, -3.16714332082574E-01)
-X( 4) = ( -6.42303281528475E-01, -6.15253476222271E-01)
-
-X( 5) = ( -3.22322395704147E-01,  3.87241657987506E-01)
-
-PATH NUMBER =      4475
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07907103632664E+00,  5.84373502964332E-01)
-X( 2) = (  8.50300702381193E-01,  4.98007784742245E-01)
-X( 3) = (  1.06750427270782E-01, -5.47096734803055E-01)
-X( 4) = ( -6.04851075684865E-01, -5.35403115797529E-01)
-
-X( 5) = ( -2.71420559716807E-01,  3.04836683986708E-01)
-
-PATH NUMBER =      4476
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.67112328733853E-01,  8.97930135855883E-01)
-X( 2) = (  5.74587512428694E-01,  7.93820628674178E-01)
-X( 3) = (  4.47625775393730E-01, -5.61811223760861E-01)
-X( 4) = ( -6.27487843825848E-01, -4.50160377041406E-01)
-
-X( 5) = ( -2.08843270736822E-01,  2.80333940388783E-01)
-
-PATH NUMBER =      4477
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.79796664365899E-01,  1.06616278204839E+00)
-X( 2) = (  1.73234124505389E-01,  8.43201391642841E-01)
-X( 3) = (  7.18209732804509E-01, -3.53972726039308E-01)
-X( 4) = ( -6.99621590558602E-01, -3.99411284785405E-01)
-
-X( 5) = ( -1.55561280936751E-01,  2.85484621508876E-01)
-
-PATH NUMBER =      4478
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.51562235738466E-01,  1.01035351669079E+00)
-X( 2) = ( -1.65961750633358E-01,  6.23044265849144E-01)
-X( 3) = (  7.91893058624900E-01, -2.08311845899166E-02)
-X( 4) = ( -7.87500134109577E-01, -4.06901903309445E-01)
-
-X( 5) = ( -1.11331691686235E-01,  3.09613269377010E-01)
-
-PATH NUMBER =      4479
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.35993579925664E-01,  7.56616115294789E-01)
-X( 2) = ( -2.84286593267885E-01,  2.36363217225868E-01)
-X( 3) = (  6.34198505804592E-01,  2.81732770887324E-01)
-X( 4) = ( -8.50004127290050E-01, -4.69127288957175E-01)
-
-X( 5) = ( -7.69939718413453E-02,  3.54036488445911E-01)
-
-PATH NUMBER =      4480
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.33957666761047E-01,  4.23677127950683E-01)
-X( 2) = ( -1.26374894495352E-01, -1.35909394094995E-01)
-X( 3) = (  3.18913108187944E-01,  4.12146103000809E-01)
-X( 4) = ( -8.57887257036369E-01, -5.56971492225894E-01)
-
-X( 5) = ( -6.58256139299991E-02,  4.26895706794005E-01)
-
-PATH NUMBER =      4481
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.46407122640996E-01,  1.67322407041457E-01)
-X( 2) = (  2.33884706835529E-01, -3.19583075927196E-01)
-X( 3) = ( -6.43759267333133E-03,  3.09386964271898E-01)
-X( 4) = ( -8.07460919329005E-01, -6.29331234126596E-01)
-
-X( 5) = ( -1.24047440163042E-01,  5.18378829039183E-01)
-
-PATH NUMBER =      4482
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.73934486046582E-01,  1.07503175545906E-01)
-X( 2) = (  6.27922739422555E-01, -2.28714871235855E-01)
-X( 3) = ( -1.89618387975972E-01,  2.15374977524640E-02)
-X( 4) = ( -7.22320158007550E-01, -6.52348587234989E-01)
-
-X( 5) = ( -2.69953455856248E-01,  5.14873352694626E-01)
-
-PATH NUMBER =      4483
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.73990511478198E-01,  3.43364797109550E-01)
-X( 2) = (  9.10751962135387E-01,  2.22109298632612E-01)
-X( 3) = ( -5.41867659828429E-04, -1.31505377235427E-01)
-X( 4) = ( -4.07778524904438E-01, -8.73480648701358E-01)
-
-X( 5) = ( -1.70336838147271E-01,  4.01901332909022E-01)
-
-PATH NUMBER =      4484
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.89775484225683E-01,  6.55528783376380E-01)
-X( 2) = (  8.89688235943253E-01,  6.25940106258510E-01)
-X( 3) = (  2.51125507381056E-01, -3.61887779955907E-01)
-X( 4) = ( -3.70326319060828E-01, -7.93630288276616E-01)
-
-X( 5) = ( -1.69462427909646E-01,  3.26310947459765E-01)
-
-PATH NUMBER =      4485
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.77816776632900E-01,  9.69085416267931E-01)
-X( 2) = (  6.13975045990754E-01,  9.21752950190444E-01)
-X( 3) = (  5.92000855504004E-01, -3.76602268913714E-01)
-X( 4) = ( -3.92963087201810E-01, -7.08387549520492E-01)
-
-X( 5) = ( -1.32536739908438E-01,  2.86086044397701E-01)
-
-PATH NUMBER =      4486
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.90501112264946E-01,  1.13731806246044E+00)
-X( 2) = (  2.12621658067449E-01,  9.71133713159106E-01)
-X( 3) = (  8.62584812914783E-01, -1.68763771192161E-01)
-X( 4) = ( -4.65096833934565E-01, -6.57638457264492E-01)
-
-X( 5) = ( -9.14033352557690E-02,  2.73947546692217E-01)
-
-PATH NUMBER =      4487
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.22666836375126E-02,  1.08150879710284E+00)
-X( 2) = ( -1.26574217071297E-01,  7.50976587365410E-01)
-X( 3) = (  9.36268138735174E-01,  1.64377770257230E-01)
-X( 4) = ( -5.52975377485540E-01, -6.65129075788532E-01)
-
-X( 5) = ( -5.31214655015507E-02,  2.80307336515136E-01)
-
-PATH NUMBER =      4488
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.53301972175290E-01,  8.27771395706838E-01)
-X( 2) = ( -2.44899059705824E-01,  3.64295538742134E-01)
-X( 3) = (  7.78573585914866E-01,  4.66941725734471E-01)
-X( 4) = ( -6.15479370666013E-01, -7.27354461436263E-01)
-
-X( 5) = ( -1.94999186948706E-02,  3.03550358988410E-01)
-
-PATH NUMBER =      4489
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.55337885339906E-01,  4.94832408362731E-01)
-X( 2) = ( -8.69873609332913E-02, -7.97707257872892E-03)
-X( 3) = (  4.63288188298218E-01,  5.97355057847956E-01)
-X( 4) = ( -6.23362500412332E-01, -8.15198664704981E-01)
-
-X( 5) = (  2.78362757063272E-03,  3.48181042573569E-01)
-
-PATH NUMBER =      4490
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71115705400418E-02,  2.38477687453505E-01)
-X( 2) = (  2.73272240397589E-01, -1.91650754410930E-01)
-X( 3) = (  1.37937487436943E-01,  4.94595919119045E-01)
-X( 4) = ( -5.72936162704967E-01, -8.87558406605683E-01)
-
-X( 5) = ( -1.04842828490415E-02,  4.14948084722461E-01)
-
-PATH NUMBER =      4491
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.84638933945628E-01,  1.78658455957954E-01)
-X( 2) = (  6.67310272984615E-01, -1.00782549719589E-01)
-X( 3) = ( -4.52433078656977E-02,  2.06746452599612E-01)
-X( 4) = ( -4.87795401383513E-01, -9.10575759714076E-01)
-
-X( 5) = ( -9.15669533662251E-02,  4.56177339163982E-01)
-
-PATH NUMBER =      4492
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.06639528759590E-01,  2.11917307839852E-01)
-X( 2) = (  8.58691252199675E-01,  3.45428961175263E-01)
-X( 3) = ( -8.99416119523633E-03,  1.03175426083490E-01)
-X( 4) = ( -6.21369113648175E-02, -9.20544531518605E-01)
-
-X( 5) = ( -4.26538769890999E-02,  4.27720588124262E-01)
-
-PATH NUMBER =      4493
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.22424501507076E-01,  5.24081294106682E-01)
-X( 2) = (  8.37627526007541E-01,  7.49259768801161E-01)
-X( 3) = (  2.42673213845648E-01, -1.27206976636990E-01)
-X( 4) = ( -2.46847055212068E-02, -8.40694171093863E-01)
-
-X( 5) = ( -8.18876814689766E-02,  3.63328616016268E-01)
-
-PATH NUMBER =      4494
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.10465793914292E-01,  8.37637926998232E-01)
-X( 2) = (  5.61914336055042E-01,  1.04507261273310E+00)
-X( 3) = (  5.83548561968596E-01, -1.41921465594797E-01)
-X( 4) = ( -4.73214736621892E-02, -7.55451432337740E-01)
-
-X( 5) = ( -6.73004667897482E-02,  3.09683705680834E-01)
-
-PATH NUMBER =      4495
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23150129546337E-01,  1.00587057319074E+00)
-X( 2) = (  1.60560948131737E-01,  1.09445337570176E+00)
-X( 3) = (  8.54132519379375E-01,  6.59170321267565E-02)
-X( 4) = ( -1.19455220394944E-01, -7.04702340081739E-01)
-
-X( 5) = ( -3.49902380844595E-02,  2.82165964765427E-01)
-
-PATH NUMBER =      4496
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.05084299081095E-01,  9.50061307833138E-01)
-X( 2) = ( -1.78634927007009E-01,  8.74296249908060E-01)
-X( 3) = (  9.27815845199765E-01,  3.99058573576147E-01)
-X( 4) = ( -2.07333763945919E-01, -7.12192958605779E-01)
-
-X( 5) = (  7.86189251558958E-04,  2.74007943907059E-01)
-
-PATH NUMBER =      4497
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.20652954893898E-01,  6.96323906437139E-01)
-X( 2) = ( -2.96959769641537E-01,  4.87615201284785E-01)
-X( 3) = (  7.70121292379458E-01,  7.01622529053388E-01)
-X( 4) = ( -2.69837757126391E-01, -7.74418344253510E-01)
-
-X( 5) = (  3.65981723311534E-02,  2.82073947484944E-01)
-
-PATH NUMBER =      4498
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.22688868058514E-01,  3.63384919093033E-01)
-X( 2) = ( -1.39048070869004E-01,  1.15342589963922E-01)
-X( 3) = (  4.54835894762810E-01,  8.32035861166873E-01)
-X( 4) = ( -2.77720886872711E-01, -8.62262547522228E-01)
-
-X( 5) = (  6.90075484627954E-02,  3.09549407064008E-01)
-
-PATH NUMBER =      4499
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.10239412178566E-01,  1.07030198183807E-01)
-X( 2) = (  2.21211530461877E-01, -6.83310918682796E-02)
-X( 3) = (  1.29485193901535E-01,  7.29276722437962E-01)
-X( 4) = ( -2.27294549165346E-01, -9.34622289422930E-01)
-
-X( 5) = (  8.36932024270017E-02,  3.63262484862022E-01)
-
-PATH NUMBER =      4500
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17287951227020E-01,  4.72109666882556E-02)
-X( 2) = (  6.15249563048903E-01,  2.25371128230618E-02)
-X( 3) = ( -5.36956014011057E-02,  4.41427255918528E-01)
-X( 4) = ( -1.42153787843892E-01, -9.57639642531323E-01)
-
-X( 5) = (  4.44114245467615E-02,  4.27747048168328E-01)
-
-PATH NUMBER =      4501
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.86329611512569E-01, -6.06272100061828E-02)
-X( 2) = (  7.39542083535453E-01,  4.06433324095208E-01)
-X( 3) = ( -1.66318906294329E-01,  2.77518321814650E-01)
-X( 4) = (  2.32892006736553E-01, -7.34423410847029E-01)
-
-X( 5) = (  9.39949574230304E-02,  4.69893588507177E-01)
-
-PATH NUMBER =      4502
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.02114584260054E-01,  2.51536776260646E-01)
-X( 2) = (  7.18478357343319E-01,  8.10264131721105E-01)
-X( 3) = (  8.53484687465548E-02,  4.71359190941701E-02)
-X( 4) = (  2.70344212580163E-01, -6.54573050422288E-01)
-
-X( 5) = (  9.01654780802830E-03,  4.25234396403043E-01)
-
-PATH NUMBER =      4503
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.90155876667270E-01,  5.65093409152198E-01)
-X( 2) = (  4.42765167390820E-01,  1.10607697565304E+00)
-X( 3) = (  4.26223816869503E-01,  3.24214301363631E-02)
-X( 4) = (  2.47707444439181E-01, -5.69330311666164E-01)
-
-X( 5) = ( -3.77615109818206E-03,  3.55226868778040E-01)
-
-PATH NUMBER =      4504
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.84021229931656E-03,  7.33326055344707E-01)
-X( 2) = (  4.14117794675153E-02,  1.15545773862170E+00)
-X( 3) = (  6.96807774280282E-01,  2.40259927857916E-01)
-X( 4) = (  1.75573697706425E-01, -5.18581219410163E-01)
-
-X( 5) = (  1.98959471036405E-02,  3.09119337114269E-01)
-
-PATH NUMBER =      4505
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.25394216328117E-01,  6.77516789987104E-01)
-X( 2) = ( -2.97784095671231E-01,  9.35300612828005E-01)
-X( 3) = (  7.70491100100673E-01,  5.73401469307308E-01)
-X( 4) = (  8.76951541554503E-02, -5.26071837934203E-01)
-
-X( 5) = (  5.48923016492485E-02,  2.85222977896090E-01)
-
-PATH NUMBER =      4506
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.40962872140919E-01,  4.23779388591104E-01)
-X( 2) = ( -4.16108938305759E-01,  5.48619564204729E-01)
-X( 3) = (  6.12796547280366E-01,  8.75965424784548E-01)
-X( 4) = (  2.51911609749780E-02, -5.88297223581934E-01)
-
-X( 5) = (  9.46101140848984E-02,  2.78649533790819E-01)
-
-PATH NUMBER =      4507
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.42998785305536E-01,  9.08404012469980E-02)
-X( 2) = ( -2.58197239533226E-01,  1.76346952883866E-01)
-X( 3) = (  2.97511149663717E-01,  1.00637875689803E+00)
-X( 4) = (  1.73080312286588E-02, -6.76141426850653E-01)
-
-X( 5) = (  1.37454638423074E-01,  2.91114021645028E-01)
-
-PATH NUMBER =      4508
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.30549329425588E-01, -1.65514319662228E-01)
-X( 2) = (  1.02062361797655E-01, -7.32672894833493E-03)
-X( 3) = ( -2.78395511975578E-02,  9.03619618169122E-01)
-X( 4) = (  6.77343689360235E-02, -7.48501168751355E-01)
-
-X( 5) = (  1.76371124478520E-01,  3.32938847768056E-01)
-
-PATH NUMBER =      4509
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.02196602000169E-03, -2.25333551157779E-01)
-X( 2) = (  4.96100394384681E-01,  8.35414757430065E-02)
-X( 3) = ( -2.11020346500198E-01,  6.15770151649689E-01)
-X( 4) = (  1.52875130257478E-01, -7.71518521859748E-01)
-
-X( 5) = (  1.77707783038769E-01,  4.12659066611172E-01)
-
-PATH NUMBER =      4510
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.69355107112807E-01, -3.46742147533477E-01)
-X( 2) = (  6.09055676356218E-01,  3.76577767994231E-01)
-X( 3) = ( -3.98902106255460E-01,  3.09946331439987E-01)
-X( 4) = (  3.39260919738848E-01, -4.02205427554707E-01)
-
-X( 5) = (  2.82841278868350E-01,  5.55917200087497E-01)
-
-PATH NUMBER =      4511
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.85140079860292E-01, -3.45781612666475E-02)
-X( 2) = (  5.87991950164084E-01,  7.80408575620129E-01)
-X( 3) = ( -1.47234731214577E-01,  7.95639287195068E-02)
-X( 4) = (  3.76713125582459E-01, -3.22355067129965E-01)
-
-X( 5) = (  1.17076791133938E-01,  5.52121672983360E-01)
-
-PATH NUMBER =      4512
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.73181372267508E-01,  2.78978471624903E-01)
-X( 2) = (  3.12278760211585E-01,  1.07622141955206E+00)
-X( 3) = (  1.93640616908372E-01,  6.48494397617000E-02)
-X( 4) = (  3.54076357441477E-01, -2.37112328373842E-01)
-
-X( 5) = (  5.85900911520150E-02,  4.47398818661345E-01)
-
-PATH NUMBER =      4513
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.58657078995544E-02,  4.47211117817413E-01)
-X( 2) = ( -8.90746277117195E-02,  1.12560218252072E+00)
-X( 3) = (  4.64224574319151E-01,  2.72687937483253E-01)
-X( 4) = (  2.81942610708722E-01, -1.86363236117841E-01)
-
-X( 5) = (  7.43890269318609E-02,  3.68979643663885E-01)
-
-PATH NUMBER =      4514
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.42368720727879E-01,  3.91401852459810E-01)
-X( 2) = ( -4.28270502850466E-01,  9.05445056727029E-01)
-X( 3) = (  5.37907900139542E-01,  6.05829478932644E-01)
-X( 4) = (  1.94064067157747E-01, -1.93853854641881E-01)
-
-X( 5) = (  1.12932855355876E-01,  3.22289951792322E-01)
-
-PATH NUMBER =      4515
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.57937376540681E-01,  1.37664451063810E-01)
-X( 2) = ( -5.46595345484993E-01,  5.18764008103753E-01)
-X( 3) = (  3.80213347319234E-01,  9.08393434409885E-01)
-X( 4) = (  1.31560073977274E-01, -2.56079240289612E-01)
-
-X( 5) = (  1.61148378210651E-01,  2.97156497025821E-01)
-
-PATH NUMBER =      4516
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.59973289705298E-01, -1.95274536280296E-01)
-X( 2) = ( -3.88683646712460E-01,  1.46491396782890E-01)
-X( 3) = (  6.49279497025856E-02,  1.03880676652337E+00)
-X( 4) = (  1.23676944230955E-01, -3.43923443558331E-01)
-
-X( 5) = (  2.19035421209648E-01,  2.91994455510912E-01)
-
-PATH NUMBER =      4517
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.47523833825349E-01, -4.51629257189522E-01)
-X( 2) = ( -2.84240453815797E-02, -3.71822850493117E-02)
-X( 3) = ( -2.60422751158690E-01,  9.36047627794459E-01)
-X( 4) = (  1.74103281938320E-01, -4.16283185459032E-01)
-
-X( 5) = (  2.87837608495634E-01,  3.18817304371109E-01)
-
-PATH NUMBER =      4518
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.00035295802367E-02, -5.11448488685073E-01)
-X( 2) = (  3.65613987205446E-01,  5.36859196420299E-02)
-X( 3) = ( -4.43603546461330E-01,  6.48198161275025E-01)
-X( 4) = (  2.59244043259774E-01, -4.39300538567425E-01)
-
-X( 5) = (  3.45127497856969E-01,  4.11059872768531E-01)
-
-PATH NUMBER =      4519
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.16867463443352E-01, -5.12551145659677E-01)
-X( 2) = (  5.28288070776015E-01,  2.69832039379526E-01)
-X( 3) = ( -5.97915496942478E-01,  1.85286028858623E-01)
-X( 4) = (  2.07198631089509E-01, -7.93390682157279E-02)
-
-X( 5) = (  6.41419667923149E-01,  8.40752200819232E-01)
-
-PATH NUMBER =      4520
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.32652436190837E-01, -2.00387159392848E-01)
-X( 2) = (  5.07224344583880E-01,  6.73662847005424E-01)
-X( 3) = ( -3.46248121901594E-01, -4.50963738618573E-02)
-X( 4) = (  2.44650836933120E-01,  5.11292209014064E-04)
-
-X( 5) = (  1.84358700567274E-01,  9.09464845000513E-01)
-
-PATH NUMBER =      4521
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.20693728598054E-01,  1.13169473498703E-01)
-X( 2) = (  2.31511154631381E-01,  9.69475690937358E-01)
-X( 3) = ( -5.37277377864640E-03, -5.98108628196644E-02)
-X( 4) = (  2.22014068792137E-01,  8.57540309651379E-02)
-
-X( 5) = (  5.76648982385489E-02,  6.52650221843575E-01)
-
-PATH NUMBER =      4522
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.33378064230100E-01,  2.81402119691213E-01)
-X( 2) = ( -1.69842233291923E-01,  1.01885645390602E+00)
-X( 3) = (  2.65211183632133E-01,  1.48027634901889E-01)
-X( 4) = (  1.49880322059382E-01,  1.36503123221139E-01)
-
-X( 5) = (  9.64655168803901E-02,  5.00283710561628E-01)
-
-PATH NUMBER =      4523
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.14363560266665E-03,  2.25592854333609E-01)
-X( 2) = ( -5.09038108430670E-01,  7.98699328112324E-01)
-X( 3) = (  3.38894509452524E-01,  4.81169176351280E-01)
-X( 4) = (  6.20017785084063E-02,  1.29012504697098E-01)
-
-X( 5) = (  1.62428004668268E-01,  4.15859652067444E-01)
-
-PATH NUMBER =      4524
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.10425020210136E-01, -2.81445470623899E-02)
-X( 2) = ( -6.27362951065197E-01,  4.12018279489048E-01)
-X( 3) = (  1.81199956632217E-01,  7.83733131828520E-01)
-X( 4) = ( -5.02214672065982E-04,  6.67871190493674E-02)
-
-X( 5) = (  2.38082974714505E-01,  3.64354032360159E-01)
-
-PATH NUMBER =      4525
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.12460933374753E-01, -3.61083534406496E-01)
-X( 2) = ( -4.69451252292664E-01,  3.97456681681848E-02)
-X( 3) = ( -1.34085440984432E-01,  9.14146463942005E-01)
-X( 4) = ( -8.38534441838513E-03, -2.10570842193519E-02)
-
-X( 5) = (  3.30116158028357E-01,  3.35413730419572E-01)
-
-PATH NUMBER =      4526
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.14774948047731E-05, -6.17438255315722E-01)
-X( 2) = ( -1.09191650961783E-01, -1.43928013664016E-01)
-X( 3) = ( -4.59436141845707E-01,  8.11387325213095E-01)
-X( 4) = (  4.20409932889797E-02, -9.34168261200536E-02)
-
-X( 5) = (  4.56234291560237E-01,  3.40853064570941E-01)
-
-PATH NUMBER =      4527
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.27515885910781E-01, -6.77257486811273E-01)
-X( 2) = (  2.84846381625243E-01, -5.30598089726749E-02)
-X( 3) = ( -6.42616937148347E-01,  5.23537858693661E-01)
-X( 4) = (  1.27181754610435E-01, -1.16434179228446E-01)
-
-X( 5) = (  6.31817076496990E-01,  4.53503410563167E-01)
-
-PATH NUMBER =      4528
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.13052898183710E-01, -4.80470331399784E-01)
-X( 2) = (  5.35031327077768E-01,  1.36143651016541E-01)
-X( 3) = ( -6.70238501065458E-01, -3.81326449066829E-02)
-X( 4) = ( -1.01501446643590E-01,  8.31029093753088E-02)
-
-X( 5) = (  1.88178790975070E-01,  3.00245186585984E+00)
-
-PATH NUMBER =      4529
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02883787093120E+00, -1.68306345132954E-01)
-X( 2) = (  5.13967600885634E-01,  5.39974458642438E-01)
-X( 3) = ( -4.18571126024574E-01, -2.68515047627163E-01)
-X( 4) = ( -6.40492407999793E-02,  1.62953269800051E-01)
-
-X( 5) = ( -6.52188730934846E-01,  1.22485767010333E+00)
-
-PATH NUMBER =      4530
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.16879163338412E-01,  1.45250287758596E-01)
-X( 2) = (  2.38254410933135E-01,  8.35787302574372E-01)
-X( 3) = ( -7.76957779016261E-02, -2.83229536584970E-01)
-X( 4) = ( -8.66860089409617E-02,  2.48196008556174E-01)
-
-X( 5) = ( -3.01975101729987E-01,  7.94014406890508E-01)
-
-PATH NUMBER =      4531
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.29563498970458E-01,  3.13482933951106E-01)
-X( 2) = ( -1.63098976990170E-01,  8.85168065543034E-01)
-X( 3) = (  1.92888179509153E-01, -7.53910388634171E-02)
-X( 4) = ( -1.58819755673717E-01,  2.98945100812175E-01)
-
-X( 5) = ( -7.86239623112548E-02,  6.54054427248562E-01)
-
-PATH NUMBER =      4532
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.01329070343025E-01,  2.57673668593503E-01)
-X( 2) = ( -5.02294852128917E-01,  6.65010939749338E-01)
-X( 3) = (  2.66571505329544E-01,  2.57750502585974E-01)
-X( 4) = ( -2.46698299224692E-01,  2.91454482288135E-01)
-
-X( 5) = (  9.21245794141625E-02,  5.85638830494664E-01)
-
-PATH NUMBER =      4533
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.57604145302222E-02,  3.93626719750360E-03)
-X( 2) = ( -6.20619694763443E-01,  2.78329891126062E-01)
-X( 3) = (  1.08876952509237E-01,  5.60314458063215E-01)
-X( 4) = ( -3.09202292405165E-01,  2.29229096640404E-01)
-
-X( 5) = (  2.55493231715495E-01,  5.45560053686588E-01)
-
-PATH NUMBER =      4534
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.37245013656056E-02, -3.29002720146603E-01)
-X( 2) = ( -4.62707995990911E-01, -9.39427201948007E-02)
-X( 3) = ( -2.06408445107412E-01,  6.90727790176699E-01)
-X( 4) = ( -3.17085422151484E-01,  1.41384893371685E-01)
-
-X( 5) = (  4.51490704964962E-01,  5.26906645953716E-01)
-
-PATH NUMBER =      4535
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.96173957245554E-01, -5.85357441055829E-01)
-X( 2) = ( -1.02448394660030E-01, -2.77616402027002E-01)
-X( 3) = ( -5.31759145968687E-01,  5.87968651447789E-01)
-X( 4) = ( -2.66659084444119E-01,  6.90251514709834E-02)
-
-X( 5) = (  7.57569864667017E-01,  5.59698361347692E-01)
-
-PATH NUMBER =      4536
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.23701320651139E-01, -6.45176672551380E-01)
-X( 2) = (  2.91589637926996E-01, -1.86748197335661E-01)
-X( 3) = ( -7.14939941271327E-01,  3.00119184928355E-01)
-X( 4) = ( -1.81518323122664E-01,  4.60077983625906E-02)
-
-X( 5) = (  1.40286756325984E+00,  9.40503298638183E-01)
-
-PATH NUMBER =      4537
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07545181040365E+00, -3.13058182802930E-01)
-X( 2) = (  6.39925718678717E-01,  3.36437297342823E-01)
-X( 3) = ( -1.03507790202416E+00, -5.27717332081476E-01)
-X( 4) = ( -2.40754915513940E-01,  1.76711903853059E-01)
-
-X( 5) = (  3.54739552777521E+00,  1.81735031439590E+00)
-
-PATH NUMBER =      4538
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19123678315114E+00, -8.94196536100995E-04)
-X( 2) = (  6.18861992486583E-01,  7.40268104968720E-01)
-X( 3) = ( -7.83410526983274E-01, -7.58099734801957E-01)
-X( 4) = ( -2.03302709670329E-01,  2.56562264277801E-01)
-
-X( 5) = ( -7.02468917576470E-01,  2.15975790649569E+00)
-
-PATH NUMBER =      4539
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07927807555835E+00,  3.12662436355450E-01)
-X( 2) = (  3.43148802534084E-01,  1.03608094890065E+00)
-X( 3) = ( -4.42535178860325E-01, -7.72814223759764E-01)
-X( 4) = ( -2.25939477811312E-01,  3.41805003033924E-01)
-
-X( 5) = ( -2.61388493421657E-01,  1.06867796956573E+00)
-
-PATH NUMBER =      4540
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.91962411190398E-01,  4.80895082547960E-01)
-X( 2) = ( -5.82045853892205E-02,  1.08546171186932E+00)
-X( 3) = ( -1.71951221449546E-01, -5.64975726038211E-01)
-X( 4) = ( -2.98073224544067E-01,  3.92554095289925E-01)
-
-X( 5) = (  1.28156967621731E-02,  7.75113081750017E-01)
-
-PATH NUMBER =      4541
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.63727982562964E-01,  4.25085817190356E-01)
-X( 2) = ( -3.97400460527967E-01,  8.65304586075620E-01)
-X( 3) = ( -9.82678956291550E-02, -2.31834184588819E-01)
-X( 4) = ( -3.85951768095042E-01,  3.85063476765885E-01)
-
-X( 5) = (  2.00673615915512E-01,  6.25811425215834E-01)
-
-PATH NUMBER =      4542
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.48159326750162E-01,  1.71348415794357E-01)
-X( 2) = ( -5.15725303162494E-01,  4.78623537452345E-01)
-X( 3) = ( -2.55962448449463E-01,  7.07297708884217E-02)
-X( 4) = ( -4.48455761275514E-01,  3.22838091118154E-01)
-
-X( 5) = (  3.66215026431505E-01,  5.19491384214811E-01)
-
-PATH NUMBER =      4543
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.46123413585545E-01, -1.61590571549750E-01)
-X( 2) = ( -3.57813604389961E-01,  1.06350926131481E-01)
-X( 3) = ( -5.71247846066111E-01,  2.01143103001907E-01)
-X( 4) = ( -4.56338891021833E-01,  2.34993887849435E-01)
-
-X( 5) = (  5.51036807165629E-01,  4.23826477436549E-01)
-
-PATH NUMBER =      4544
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.58572869465494E-01, -4.17945292458976E-01)
-X( 2) = (  2.44599694091939E-03, -7.73227557007200E-02)
-X( 3) = ( -8.96598546927387E-01,  9.83839642729958E-02)
-X( 4) = ( -4.05912553314469E-01,  1.62634145948733E-01)
-
-X( 5) = (  8.20832803846576E-01,  3.21300078918182E-01)
-
-PATH NUMBER =      4545
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.86100232871079E-01, -4.77764523954527E-01)
-X( 2) = (  3.96484029527946E-01,  1.35454489906216E-02)
-X( 3) = ( -1.07977934223003E+00, -1.89465502246438E-01)
-X( 4) = ( -3.20771791993014E-01,  1.39616792840341E-01)
-
-X( 5) = (  1.40357874528397E+00,  2.27103996441239E-01)
-
-PATH NUMBER =      4546
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09529043679171E+00, -1.58016954070329E-02)
-X( 2) = (  7.72754034194633E-01,  3.19863363414877E-01)
-X( 3) = ( -8.27612217801733E-01, -6.37737832819029E-01)
-X( 4) = ( -4.54334240404220E-01, -9.90905726686719E-02)
-
-X( 5) = ( -6.73495912607195E-01,  1.37773255845833E+00)
-
-PATH NUMBER =      4547
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21107540953920E+00,  2.96362290859797E-01)
-X( 2) = (  7.51690308002499E-01,  7.23694171040775E-01)
-X( 3) = ( -5.75944842760849E-01, -8.68120235539509E-01)
-X( 4) = ( -4.16882034560610E-01, -1.92402122439300E-02)
-
-X( 5) = ( -5.33981946945622E-01,  7.35958784652609E-01)
-
-PATH NUMBER =      4548
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09911670194641E+00,  6.09918923751347E-01)
-X( 2) = (  4.75977118049999E-01,  1.01950701497271E+00)
-X( 3) = ( -2.35069494637901E-01, -8.82834724497316E-01)
-X( 4) = ( -4.39518802701592E-01,  6.60025265121935E-02)
-
-X( 5) = ( -3.07362813116206E-01,  5.73681714698094E-01)
-
-PATH NUMBER =      4549
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.11801037578461E-01,  7.78151569943858E-01)
-X( 2) = (  7.46237301266950E-02,  1.06888777794137E+00)
-X( 3) = (  3.55144627728787E-02, -6.74996226775763E-01)
-X( 4) = ( -5.11652549434348E-01,  1.16751618768194E-01)
-
-X( 5) = ( -1.46195159934259E-01,  5.27250752484676E-01)
-
-PATH NUMBER =      4550
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.83566608951028E-01,  7.22342304586254E-01)
-X( 2) = ( -2.64572145012052E-01,  8.48730652147674E-01)
-X( 3) = (  1.09197788593270E-01, -3.41854685326372E-01)
-X( 4) = ( -5.99531092985323E-01,  1.09261000244154E-01)
-
-X( 5) = ( -1.22102809785193E-02,  5.20443657881959E-01)
-
-PATH NUMBER =      4551
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67997953138225E-01,  4.68604903190255E-01)
-X( 2) = ( -3.82896987646579E-01,  4.62049603524399E-01)
-X( 3) = ( -4.84967642270376E-02, -3.92907298491307E-02)
-X( 4) = ( -6.62035086165795E-01,  4.70356145964231E-02)
-
-X( 5) = (  1.22261024154761E-01,  5.41427685524519E-01)
-
-PATH NUMBER =      4552
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.65962039973609E-01,  1.35665915846148E-01)
-X( 2) = ( -2.24985288874046E-01,  8.97769922035355E-02)
-X( 3) = ( -3.63782161843686E-01,  9.11226022643543E-02)
-X( 4) = ( -6.69918215912114E-01, -4.08085886722961E-02)
-
-X( 5) = (  2.84560368686668E-01,  6.08534351606221E-01)
-
-PATH NUMBER =      4553
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.78411495853556E-01, -1.20688805063078E-01)
-X( 2) = (  1.35274312456835E-01, -9.38966896286659E-02)
-X( 3) = ( -6.89132862704962E-01, -1.16365364645563E-02)
-X( 4) = ( -6.19491878204749E-01, -1.13168330572998E-01)
-
-X( 5) = (  5.05272552052103E-01,  8.17836716370759E-01)
-
-PATH NUMBER =      4554
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.05938859259142E-01, -1.80508036558629E-01)
-X( 2) = (  5.29312345043861E-01, -3.02848493732429E-03)
-X( 3) = ( -8.72313658007602E-01, -2.99486002983990E-01)
-X( 4) = ( -5.34351116883295E-01, -1.36185683681390E-01)
-
-X( 5) = (  4.92461416110856E-01,  1.55724185668018E+00)
-
-PATH NUMBER =      4555
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.19414919298376E-01,  2.24662008179109E-01)
-X( 2) = (  8.85159946557102E-01,  3.92547388857918E-01)
-X( 3) = ( -5.97964468579660E-01, -5.88662054784883E-01)
-X( 4) = ( -4.40663080772492E-01, -4.47653670931285E-01)
-
-X( 5) = ( -2.11857288067737E-01,  7.22437566998184E-01)
-
-PATH NUMBER =      4556
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03519989204586E+00,  5.36825994445938E-01)
-X( 2) = (  8.64096220364967E-01,  7.96378196483815E-01)
-X( 3) = ( -3.46297093538776E-01, -8.19044457505363E-01)
-X( 4) = ( -4.03210874928881E-01, -3.67803310506543E-01)
-
-X( 5) = ( -2.41948539138740E-01,  5.20983329949539E-01)
-
-PATH NUMBER =      4557
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.23241184453077E-01,  8.50382627337489E-01)
-X( 2) = (  5.88383030412468E-01,  1.09219104041575E+00)
-X( 3) = ( -5.42174541582759E-03, -8.33758946463170E-01)
-X( 4) = ( -4.25847643069864E-01, -2.82560571750420E-01)
-
-X( 5) = ( -1.68142735459047E-01,  4.22539627168057E-01)
-
-PATH NUMBER =      4558
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.35925520085123E-01,  1.01861527353000E+00)
-X( 2) = (  1.87029642489163E-01,  1.14157180338441E+00)
-X( 3) = (  2.65162211994952E-01, -6.25920448741617E-01)
-X( 4) = ( -4.97981389802619E-01, -2.31811479494419E-01)
-
-X( 5) = ( -9.08993211891456E-02,  3.86805449674750E-01)
-
-PATH NUMBER =      4559
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.07691091457690E-01,  9.62806008172395E-01)
-X( 2) = ( -1.52166232649583E-01,  9.21414677590715E-01)
-X( 3) = (  3.38845537815343E-01, -2.92778907292226E-01)
-X( 4) = ( -5.85859933353594E-01, -2.39302098018459E-01)
-
-X( 5) = ( -1.94063818290236E-02,  3.82283337743911E-01)
-
-PATH NUMBER =      4560
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.21224356448880E-02,  7.09068606776396E-01)
-X( 2) = ( -2.70491075284110E-01,  5.34733628967440E-01)
-X( 3) = (  1.81150984995035E-01,  9.78504818501501E-03)
-X( 4) = ( -6.48363926534066E-01, -3.01527483666190E-01)
-
-X( 5) = (  5.09006100586719E-02,  4.02372473374896E-01)
-
-PATH NUMBER =      4561
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.00865224802715E-02,  3.76129619432290E-01)
-X( 2) = ( -1.12579376511577E-01,  1.62461017646576E-01)
-X( 3) = ( -1.34134412621614E-01,  1.40198380298500E-01)
-X( 4) = ( -6.56247056280385E-01, -3.89371686934909E-01)
-
-X( 5) = (  1.22189606089575E-01,  4.58293341458839E-01)
-
-PATH NUMBER =      4562
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.02535978360220E-01,  1.19774898523064E-01)
-X( 2) = (  2.47680224819304E-01, -2.12126641856248E-02)
-X( 3) = ( -4.59485113482889E-01,  3.74392415695890E-02)
-X( 4) = ( -6.05820718573021E-01, -4.61731428835610E-01)
-
-X( 5) = (  1.70914166654089E-01,  5.85553641072587E-01)
-
-PATH NUMBER =      4563
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.30063341765806E-01,  5.99556670275126E-02)
-X( 2) = (  6.41718257406330E-01,  6.96555405057168E-02)
-X( 3) = ( -6.42665908785530E-01, -2.50410224949845E-01)
-X( 4) = ( -5.20679957251566E-01, -4.84748781944003E-01)
-
-X( 5) = (  5.96865453492869E-02,  7.81273002273242E-01)
-
-PATH NUMBER =      4564
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.30119367197422E-01,  2.95817288591157E-01)
-X( 2) = (  9.24547480119161E-01,  5.20479710374184E-01)
-X( 3) = ( -4.53589388469386E-01, -4.03453099937735E-01)
-X( 4) = ( -2.06138324148454E-01, -7.05880843410371E-01)
-
-X( 5) = (  5.78019743781692E-04,  5.38100582251915E-01)
-
-PATH NUMBER =      4565
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.45904339944907E-01,  6.07981274857986E-01)
-X( 2) = (  9.03483753927027E-01,  9.24310518000081E-01)
-X( 3) = ( -2.01922013428502E-01, -6.33835502658216E-01)
-X( 4) = ( -1.68686118304843E-01, -6.26030482985630E-01)
-
-X( 5) = ( -7.43969151297062E-02,  4.50085122964115E-01)
-
-PATH NUMBER =      4566
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.33945632352124E-01,  9.21537907749536E-01)
-X( 2) = (  6.27770563974528E-01,  1.22012336193202E+00)
-X( 3) = (  1.38953334694446E-01, -6.48549991616023E-01)
-X( 4) = ( -1.91322886445826E-01, -5.40787744229506E-01)
-
-X( 5) = ( -6.16552662375143E-02,  3.70413141458669E-01)
-
-PATH NUMBER =      4567
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.46629967984170E-01,  1.08977055394205E+00)
-X( 2) = (  2.26417176051224E-01,  1.26950412490068E+00)
-X( 3) = (  4.09537292105225E-01, -4.40711493894470E-01)
-X( 4) = ( -2.63456633178581E-01, -4.90038651973505E-01)
-
-X( 5) = ( -2.16330305354923E-02,  3.28196469613766E-01)
-
-PATH NUMBER =      4568
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.83955393567369E-02,  1.03396128858444E+00)
-X( 2) = ( -1.12778699087523E-01,  1.04934699910698E+00)
-X( 3) = (  4.83220617925616E-01, -1.07569952445079E-01)
-X( 4) = ( -3.51335176729556E-01, -4.97529270497546E-01)
-
-X( 5) = (  2.37295268209612E-02,  3.11383358091309E-01)
-
-PATH NUMBER =      4569
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.97173116456066E-01,  7.80223887188444E-01)
-X( 2) = ( -2.31103541722050E-01,  6.62665950483705E-01)
-X( 3) = (  3.25526065105309E-01,  1.94994003032163E-01)
-X( 4) = ( -4.13839169910029E-01, -5.59754656145276E-01)
-
-X( 5) = (  7.10072457928073E-02,  3.13984497945850E-01)
-
-PATH NUMBER =      4570
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.99209029620682E-01,  4.47284899844337E-01)
-X( 2) = ( -7.31918429495172E-02,  2.90393339162842E-01)
-X( 3) = (  1.02406674886602E-02,  3.25407335145647E-01)
-X( 4) = ( -4.21722299656348E-01, -6.47598859413996E-01)
-
-X( 5) = (  1.19124561586130E-01,  3.39769847836836E-01)
-
-PATH NUMBER =      4571
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.32404262592660E-02,  1.90930178935111E-01)
-X( 2) = (  2.87067758381364E-01,  1.06719657330641E-01)
-X( 3) = ( -3.15110033372615E-01,  2.22648196416737E-01)
-X( 4) = ( -3.71295961948983E-01, -7.19958601314697E-01)
-
-X( 5) = (  1.56030859284006E-01,  4.03102484047061E-01)
-
-PATH NUMBER =      4572
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.40767789664852E-01,  1.31110947439560E-01)
-X( 2) = (  6.81105790968390E-01,  1.97587862021982E-01)
-X( 3) = ( -4.98290828675256E-01, -6.52012701026972E-02)
-X( 4) = ( -2.86155200627528E-01, -7.42975954423090E-01)
-
-X( 5) = (  1.28891624350633E-01,  5.05855603271477E-01)
-
-PATH NUMBER =      4573
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.62768384478814E-01,  1.64369799321458E-01)
-X( 2) = (  8.72486770183449E-01,  6.43799372916835E-01)
-X( 3) = ( -4.62041682004794E-01, -1.68772296618819E-01)
-X( 4) = (  1.39503289391167E-01, -7.52944726227619E-01)
-
-X( 5) = (  1.41431943220247E-01,  4.38908402691837E-01)
-
-PATH NUMBER =      4574
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.78553357226299E-01,  4.76533785588288E-01)
-X( 2) = (  8.51423043991315E-01,  1.04763018054273E+00)
-X( 3) = ( -2.10374306963910E-01, -3.99154699339299E-01)
-X( 4) = (  1.76955495234777E-01, -6.73094365802877E-01)
-
-X( 5) = (  5.35945778046186E-02,  4.15313105815888E-01)
-
-PATH NUMBER =      4575
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.66594649633516E-01,  7.90090418479838E-01)
-X( 2) = (  5.75709854038816E-01,  1.34344302447467E+00)
-X( 3) = (  1.30501041159038E-01, -4.13869188297106E-01)
-X( 4) = (  1.54318727093795E-01, -5.87851627046754E-01)
-
-X( 5) = (  2.79728927256585E-02,  3.50804709483220E-01)
-
-PATH NUMBER =      4576
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.92789852655623E-02,  9.58323064672349E-01)
-X( 2) = (  1.74356466115511E-01,  1.39282378744333E+00)
-X( 3) = (  4.01084998569817E-01, -2.06030690575553E-01)
-X( 4) = (  8.21849803610394E-02, -5.37102534790753E-01)
-
-X( 5) = (  4.32502559732966E-02,  3.02511380213905E-01)
-
-PATH NUMBER =      4577
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.48955443361871E-01,  9.02513799314745E-01)
-X( 2) = ( -1.64839409023235E-01,  1.17266666164963E+00)
-X( 3) = (  4.74768324390208E-01,  1.27110850873838E-01)
-X( 4) = ( -5.69356318993586E-03, -5.44593153314793E-01)
-
-X( 5) = (  7.32646148205741E-02,  2.74698199229732E-01)
-
-PATH NUMBER =      4578
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.64524099174673E-01,  6.48776397918746E-01)
-X( 2) = ( -2.83164251657762E-01,  7.85985613026356E-01)
-X( 3) = (  3.17073771569901E-01,  4.29674806351079E-01)
-X( 4) = ( -6.81975563704082E-02, -6.06818538962524E-01)
-
-X( 5) = (  1.09736347619911E-01,  2.63334295962052E-01)
-
-PATH NUMBER =      4579
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.66560012339290E-01,  3.15837410574639E-01)
-X( 2) = ( -1.25252552885229E-01,  4.13713001705493E-01)
-X( 3) = (  1.78837395325254E-03,  5.60088138464564E-01)
-X( 4) = ( -7.60806861167273E-02, -6.94662742231243E-01)
-
-X( 5) = (  1.50773342958410E-01,  2.69388609319098E-01)
-
-PATH NUMBER =      4580
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.54110556459342E-01,  5.94826896654135E-02)
-X( 2) = (  2.35007048445652E-01,  2.30039319873291E-01)
-X( 3) = ( -3.23562326908023E-01,  4.57328999735653E-01)
-X( 4) = ( -2.56543484093625E-02, -7.67022484131945E-01)
-
-X( 5) = (  1.91362210272243E-01,  3.01837338712741E-01)
-
-PATH NUMBER =      4581
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.34168069462437E-02, -3.36541830137716E-04)
-X( 2) = (  6.29045081032678E-01,  3.20907524564633E-01)
-X( 3) = ( -5.06743122210663E-01,  1.69479533216220E-01)
-X( 4) = (  5.94864129120922E-02, -7.90039837240338E-01)
-
-X( 5) = (  2.04977847053304E-01,  3.72028435533412E-01)
-
-PATH NUMBER =      4582
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.42458467231793E-01, -1.08174718524577E-01)
-X( 2) = (  7.53337601519227E-01,  7.04803735836779E-01)
-X( 3) = ( -6.19366427103887E-01,  5.57059911234168E-03)
-X( 4) = (  4.34532207492537E-01, -5.66823605556043E-01)
-
-X( 5) = (  2.64919477763589E-01,  3.64384069643168E-01)
-
-PATH NUMBER =      4583
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.58243439979278E-01,  2.03989267742253E-01)
-X( 2) = (  7.32273875327093E-01,  1.10863454346268E+00)
-X( 3) = ( -3.67699052063003E-01, -2.24811803608139E-01)
-X( 4) = (  4.71984413336147E-01, -4.86973245131301E-01)
-
-X( 5) = (  1.78345008414210E-01,  3.95924740685147E-01)
-
-PATH NUMBER =      4584
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.46284732386495E-01,  5.17545900633803E-01)
-X( 2) = (  4.56560685374593E-01,  1.40444738739461E+00)
-X( 3) = ( -2.68237039400550E-02, -2.39526292565946E-01)
-X( 4) = (  4.49347645195165E-01, -4.01730506375177E-01)
-
-X( 5) = (  1.18254892311852E-01,  3.50087763941319E-01)
-
-PATH NUMBER =      4585
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.10309319814589E-02,  6.85778546826313E-01)
-X( 2) = (  5.52072974512892E-02,  1.45382815036327E+00)
-X( 3) = (  2.43760253470724E-01, -3.16877948443928E-02)
-X( 4) = (  3.77213898462409E-01, -3.50981414119177E-01)
-
-X( 5) = (  1.09863284679307E-01,  2.95812155262148E-01)
-
-PATH NUMBER =      4586
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.69265360608892E-01,  6.29969281468710E-01)
-X( 2) = ( -2.83988577687457E-01,  1.23367102456958E+00)
-X( 3) = (  3.17443579291116E-01,  3.01453746604998E-01)
-X( 4) = (  2.89335354911434E-01, -3.58472032643217E-01)
-
-X( 5) = (  1.26892875283101E-01,  2.56794783074365E-01)
-
-PATH NUMBER =      4587
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.84834016421694E-01,  3.76231880072711E-01)
-X( 2) = ( -4.02313420321984E-01,  8.46989975946300E-01)
-X( 3) = (  1.59749026470808E-01,  6.04017702082239E-01)
-X( 4) = (  2.26831361730961E-01, -4.20697418290948E-01)
-
-X( 5) = (  1.55880624015486E-01,  2.32576958518025E-01)
-
-PATH NUMBER =      4588
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.86869929586311E-01,  4.32928927286045E-02)
-X( 2) = ( -2.44401721549451E-01,  4.74717364625437E-01)
-X( 3) = ( -1.55536371145840E-01,  7.34431034195724E-01)
-X( 4) = (  2.18948231984642E-01, -5.08541621559667E-01)
-
-X( 5) = (  1.93548503395021E-01,  2.22790803713502E-01)
-
-PATH NUMBER =      4589
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.74420473706363E-01, -2.13061828180621E-01)
-X( 2) = (  1.15857879781430E-01,  2.91043682793236E-01)
-X( 3) = ( -4.80887072007115E-01,  6.31671895466813E-01)
-X( 4) = (  2.69374569692007E-01, -5.80901363460369E-01)
-
-X( 5) = (  2.38670671426728E-01,  2.33768030946200E-01)
-
-PATH NUMBER =      4590
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.68931103007776E-02, -2.72881059676173E-01)
-X( 2) = (  5.09895912368455E-01,  3.81911887484577E-01)
-X( 3) = ( -6.64067867309756E-01,  3.43822428947380E-01)
-X( 4) = (  3.54515331013462E-01, -6.03918716568762E-01)
-
-X( 5) = (  2.78801279626148E-01,  2.81473234813269E-01)
-
-PATH NUMBER =      4591
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.25483962832032E-01, -3.94289656051870E-01)
-X( 2) = (  6.22851194339993E-01,  6.74948179735802E-01)
-X( 3) = ( -8.51949627065018E-01,  3.79986087376781E-02)
-X( 4) = (  5.40901120494832E-01, -2.34605622263721E-01)
-
-X( 5) = (  4.03541376093567E-01,  2.92908941387935E-01)
-
-PATH NUMBER =      4592
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.41268935579516E-01, -8.21256697850410E-02)
-X( 2) = (  6.01787468147859E-01,  1.07877898736170E+00)
-X( 3) = ( -6.00282252024134E-01, -1.92383793982802E-01)
-X( 4) = (  5.78353326338443E-01, -1.54755261838979E-01)
-
-X( 5) = (  3.33040725573866E-01,  3.90728640815208E-01)
-
-PATH NUMBER =      4593
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.29310227986733E-01,  2.31430963106510E-01)
-X( 2) = (  3.26074278195360E-01,  1.37459183129363E+00)
-X( 3) = ( -2.59406903901186E-01, -2.07098282940609E-01)
-X( 4) = (  5.55716558197460E-01, -6.95125230828557E-02)
-
-X( 5) = (  2.28066261850322E-01,  3.75035261005437E-01)
-
-PATH NUMBER =      4594
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.19945636187788E-02,  3.99663609299020E-01)
-X( 2) = ( -7.52791097279450E-02,  1.42397259426230E+00)
-X( 3) = (  1.11770535095934E-02,  7.40214780944240E-04)
-X( 4) = (  4.83582811464706E-01, -1.87634308268551E-02)
-
-X( 5) = (  1.88017476946051E-01,  3.11385853139694E-01)
-
-PATH NUMBER =      4595
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.86239865008655E-01,  3.43854343941416E-01)
-X( 2) = ( -4.14474984866692E-01,  1.20381546846860E+00)
-X( 3) = (  8.48603793299845E-02,  3.33881756230336E-01)
-X( 4) = (  3.95704267913730E-01, -2.62540493508952E-02)
-
-X( 5) = (  1.90454798436289E-01,  2.56680994272142E-01)
-
-PATH NUMBER =      4596
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.01808520821457E-01,  9.01169425454164E-02)
-X( 2) = ( -5.32799827501219E-01,  8.17134419845324E-01)
-X( 3) = ( -7.28341734903231E-02,  6.36445711707576E-01)
-X( 4) = (  3.33200274733258E-01, -8.84794349986259E-02)
-
-X( 5) = (  2.12768647304205E-01,  2.16769173347825E-01)
-
-PATH NUMBER =      4597
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.03844433986073E-01, -2.42822044798690E-01)
-X( 2) = ( -3.74888128728686E-01,  4.44861808524461E-01)
-X( 3) = ( -3.88119571106972E-01,  7.66859043821061E-01)
-X( 4) = (  3.25317144986939E-01, -1.76323638267345E-01)
-
-X( 5) = (  2.48590658067693E-01,  1.89937275710797E-01)
-
-PATH NUMBER =      4598
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.91394978106125E-01, -4.99176765707916E-01)
-X( 2) = ( -1.46285273978051E-02,  2.61188126692259E-01)
-X( 3) = ( -7.13470271968247E-01,  6.64099905092150E-01)
-X( 4) = (  3.75743482694304E-01, -2.48683380168046E-01)
-
-X( 5) = (  2.98998137417840E-01,  1.79824226693065E-01)
-
-PATH NUMBER =      4599
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.61323852994609E-02, -5.58995997203467E-01)
-X( 2) = (  3.79409505189221E-01,  3.52056331383601E-01)
-X( 3) = ( -8.96651067270888E-01,  3.76250438572717E-01)
-X( 4) = (  4.60884244015758E-01, -2.71700733276439E-01)
-
-X( 5) = (  3.63053527553447E-01,  2.03891288074540E-01)
-
-PATH NUMBER =      4600
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.72996319162576E-01, -5.60098654178071E-01)
-X( 2) = (  5.42083588759789E-01,  5.68202451121097E-01)
-X( 3) = ( -1.05096301775204E+00, -8.66616938436855E-02)
-X( 4) = (  4.08838831845493E-01,  8.82607370752579E-02)
-
-X( 5) = (  6.09646022145345E-01,  2.07811747289758E-01)
-
-PATH NUMBER =      4601
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.88781291910061E-01, -2.47934667911242E-01)
-X( 2) = (  5.21019862567655E-01,  9.72033258746995E-01)
-X( 3) = ( -7.99295642711152E-01, -3.17044096564166E-01)
-X( 4) = (  4.46291037689104E-01,  1.68111097500000E-01)
-
-X( 5) = (  5.90248626670318E-01,  4.28173576997983E-01)
-
-PATH NUMBER =      4602
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.76822584317278E-01,  6.56219649803089E-02)
-X( 2) = (  2.45306672615156E-01,  1.26784610267893E+00)
-X( 3) = ( -4.58420294588204E-01, -3.31758585521973E-01)
-X( 4) = (  4.23654269548121E-01,  2.53353836256124E-01)
-
-X( 5) = (  3.85444182538931E-01,  4.74912652957576E-01)
-
-PATH NUMBER =      4603
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.89506919949324E-01,  2.33854611172819E-01)
-X( 2) = ( -1.56046715308149E-01,  1.31722686564759E+00)
-X( 3) = ( -1.87836337177425E-01, -1.23920087800420E-01)
-X( 4) = (  3.51520522815365E-01,  3.04102928512125E-01)
-
-X( 5) = (  2.86990883328619E-01,  3.79533086187015E-01)
-
-PATH NUMBER =      4604
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.87275086781090E-02,  1.78045345815216E-01)
-X( 2) = ( -4.95242590446895E-01,  1.09706973985389E+00)
-X( 3) = ( -1.14153011357033E-01,  2.09221453648971E-01)
-X( 4) = (  2.63641979264390E-01,  2.96612309988084E-01)
-
-X( 5) = (  2.71737516424358E-01,  2.91528212474907E-01)
-
-PATH NUMBER =      4605
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.54296164490912E-01, -7.56920555807832E-02)
-X( 2) = ( -6.13567433081422E-01,  7.10388691230619E-01)
-X( 3) = ( -2.71847564177340E-01,  5.11785409126212E-01)
-X( 4) = (  2.01137986083918E-01,  2.34386924340353E-01)
-
-X( 5) = (  2.89681606823734E-01,  2.25050132283274E-01)
-
-PATH NUMBER =      4606
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.56332077655529E-01, -4.08631042924890E-01)
-X( 2) = ( -4.55655734308890E-01,  3.38116079909756E-01)
-X( 3) = ( -5.87132961793989E-01,  6.42198741239697E-01)
-X( 4) = (  1.93254856337599E-01,  1.46542721071634E-01)
-
-X( 5) = (  3.27283257947325E-01,  1.73281551039421E-01)
-
-PATH NUMBER =      4607
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.38826217755806E-02, -6.64985763834115E-01)
-X( 2) = ( -9.53961329780089E-02,  1.54442398077555E-01)
-X( 3) = ( -9.12483662655264E-01,  5.39439602510786E-01)
-X( 4) = (  2.43681194044964E-01,  7.41829791709320E-02)
-
-X( 5) = (  3.87501458272493E-01,  1.34635108789332E-01)
-
-PATH NUMBER =      4608
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.83644741630005E-01, -7.24804995329667E-01)
-X( 2) = (  2.98641899609017E-01,  2.45310602768896E-01)
-X( 3) = ( -1.09566445795791E+00,  2.51590135991353E-01)
-X( 4) = (  3.28821955366419E-01,  5.11656260625394E-02)
-
-X( 5) = (  4.83374705433744E-01,  1.24265467151729E-01)
-
-PATH NUMBER =      4609
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.69181753902934E-01, -5.28017839918177E-01)
-X( 2) = (  5.48826845061543E-01,  4.34514062758112E-01)
-X( 3) = ( -1.12328602187502E+00, -3.10080367608991E-01)
-X( 4) = (  1.00138754112394E-01,  2.50702714666295E-01)
-
-X( 5) = (  1.08237576072128E+00,  9.54692483470744E-02)
-
-PATH NUMBER =      4610
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.84966726650420E-01, -2.15853853651348E-01)
-X( 2) = (  5.27763118869409E-01,  8.38344870384009E-01)
-X( 3) = ( -8.71618646834132E-01, -5.40462770329472E-01)
-X( 4) = (  1.37590959956005E-01,  3.30553075091037E-01)
-
-X( 5) = (  1.21430487153461E+00,  8.39316293491676E-01)
-
-PATH NUMBER =      4611
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.73008019057636E-01,  9.77027792402028E-02)
-X( 2) = (  2.52049928916909E-01,  1.13415771431594E+00)
-X( 3) = ( -5.30743298711184E-01, -5.55177259287279E-01)
-X( 4) = (  1.14954191815022E-01,  4.15795813847160E-01)
-
-X( 5) = (  5.02927361160557E-01,  8.94583344704040E-01)
-
-PATH NUMBER =      4612
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.85692354689682E-01,  2.65935425432713E-01)
-X( 2) = ( -1.49303459006395E-01,  1.18353847728461E+00)
-X( 3) = ( -2.60159341300404E-01, -3.47338761565726E-01)
-X( 4) = (  4.28204450822669E-02,  4.66544906103161E-01)
-
-X( 5) = (  3.42155253081693E-01,  6.01337165133912E-01)
-
-PATH NUMBER =      4613
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.57457926062249E-01,  2.10126160075110E-01)
-X( 2) = ( -4.88499334145142E-01,  9.63381351490909E-01)
-X( 3) = ( -1.86476015480013E-01, -1.41972201163349E-02)
-X( 4) = ( -4.50580984687082E-02,  4.59054287579121E-01)
-
-X( 5) = (  3.46261621103092E-01,  4.23198606669452E-01)
-
-PATH NUMBER =      4614
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.18892702494463E-02, -4.36112413208899E-02)
-X( 2) = ( -6.06824176779669E-01,  5.76700302867634E-01)
-X( 3) = ( -3.44170568300321E-01,  2.88366735360906E-01)
-X( 4) = ( -1.07562091649180E-01,  3.96828901931390E-01)
-
-X( 5) = (  3.87554122510873E-01,  3.03359119862683E-01)
-
-PATH NUMBER =      4615
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.98533570848300E-02, -3.76550228664996E-01)
-X( 2) = ( -4.48912478007136E-01,  2.04427691546770E-01)
-X( 3) = ( -6.59455965916969E-01,  4.18780067474391E-01)
-X( 4) = ( -1.15445221395500E-01,  3.08984698662671E-01)
-
-X( 5) = (  4.50111673762893E-01,  2.07042794463077E-01)
-
-PATH NUMBER =      4616
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.52302812964778E-01, -6.32904949574222E-01)
-X( 2) = ( -8.86528766762552E-02,  2.07540097145691E-02)
-X( 3) = ( -9.84806666778244E-01,  3.16020928745480E-01)
-X( 4) = ( -6.50188836881349E-02,  2.36624956761969E-01)
-
-X( 5) = (  5.45734401673171E-01,  1.18504450309526E-01)
-
-PATH NUMBER =      4617
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.79830176370364E-01, -6.92724181069774E-01)
-X( 2) = (  3.05385155910771E-01,  1.11622214405911E-01)
-X( 3) = ( -1.16798746208089E+00,  2.81714622260464E-02)
-X( 4) = (  2.01218776333198E-02,  2.13607603653577E-01)
-
-X( 5) = (  7.18271177260161E-01,  4.07880828500354E-02)
-
-PATH NUMBER =      4618
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07240751346118E+00, -3.77681515454052E-01)
-X( 2) = (  4.58704894805582E-01,  5.73869881277753E-01)
-X( 3) = ( -1.20732781117363E+00, -1.02725470685203E+00)
-X( 4) = ( -1.94020638442345E-01,  4.34712626024695E-01)
-
-X( 5) = (  7.57912630341426E-01, -6.62056334489628E-01)
-
-PATH NUMBER =      4619
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18819248620866E+00, -6.55175291872223E-02)
-X( 2) = (  4.37641168613448E-01,  9.77700688903651E-01)
-X( 3) = ( -9.55660436132751E-01, -1.25763710957251E+00)
-X( 4) = ( -1.56568432598735E-01,  5.14562986449436E-01)
-
-X( 5) = (  1.42287275098218E+00, -1.27837798056563E+00)
-
-PATH NUMBER =      4620
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07623377861588E+00,  2.48039103704328E-01)
-X( 2) = (  1.61927978660949E-01,  1.27351353283558E+00)
-X( 3) = ( -6.14785088009802E-01, -1.27235159853032E+00)
-X( 4) = ( -1.79205200739717E-01,  5.99805725205560E-01)
-
-X( 5) = (  2.84285344058362E+00,  1.05575403437114E+00)
-
-PATH NUMBER =      4621
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.88918114247927E-01,  4.16271749896839E-01)
-X( 2) = ( -2.39425409262356E-01,  1.32289429580425E+00)
-X( 3) = ( -3.44201130599023E-01, -1.06451310080876E+00)
-X( 4) = ( -2.51338947472473E-01,  6.50554817461561E-01)
-
-X( 5) = (  9.57438940750895E-01,  9.14093184392086E-01)
-
-PATH NUMBER =      4622
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.60683685620494E-01,  3.60462484539235E-01)
-X( 2) = ( -5.78621284401102E-01,  1.10273717001055E+00)
-X( 3) = ( -2.70517804778631E-01, -7.31371559359372E-01)
-X( 4) = ( -3.39217491023448E-01,  6.43064198937520E-01)
-
-X( 5) = (  6.85849833048314E-01,  4.71804228695033E-01)
-
-PATH NUMBER =      4623
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.45115029807691E-01,  1.06725083143236E-01)
-X( 2) = ( -6.96946127035629E-01,  7.16056121387275E-01)
-X( 3) = ( -4.28212357598939E-01, -4.28807603882131E-01)
-X( 4) = ( -4.01721484203920E-01,  5.80838813289789E-01)
-
-X( 5) = (  6.17713132757501E-01,  2.23426256862652E-01)
-
-PATH NUMBER =      4624
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.43079116643075E-01, -2.26213904200871E-01)
-X( 2) = ( -5.39034428263096E-01,  3.43783510066412E-01)
-X( 3) = ( -7.43497755215588E-01, -2.98394271768646E-01)
-X( 4) = ( -4.09604613950239E-01,  4.92994610021070E-01)
-
-X( 5) = (  5.97935253959628E-01,  3.90943638154595E-02)
-
-PATH NUMBER =      4625
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.55528572523023E-01, -4.82568625110097E-01)
-X( 2) = ( -1.78774826932215E-01,  1.60109828234210E-01)
-X( 3) = ( -1.06884845607686E+00, -4.01153410497557E-01)
-X( 4) = ( -3.59178276242874E-01,  4.20634868120369E-01)
-
-X( 5) = (  6.02047045326851E-01, -1.34990904584081E-01)
-
-PATH NUMBER =      4626
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.83055935928609E-01, -5.42387856605648E-01)
-X( 2) = (  2.15263205654811E-01,  2.50978032925552E-01)
-X( 3) = ( -1.25202925137950E+00, -6.89002877016991E-01)
-X( 4) = ( -2.74037514921419E-01,  3.97617515011976E-01)
-
-X( 5) = (  6.36114486359525E-01, -3.42103321448639E-01)
-
-PATH NUMBER =      4627
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09224613984924E+00, -8.04250280581538E-02)
-X( 2) = (  5.91533210321498E-01,  5.57295947349808E-01)
-X( 3) = ( -9.99862126951209E-01, -1.13727520758958E+00)
-X( 4) = ( -4.07599963332626E-01,  1.58910149502964E-01)
-
-X( 5) = (  2.64623449402622E+00, -2.02079456616727E+00)
-
-PATH NUMBER =      4628
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.20803111259673E+00,  2.31738958208676E-01)
-X( 2) = (  5.70469484129364E-01,  9.61126754975705E-01)
-X( 3) = ( -7.48194751910325E-01, -1.36765761031006E+00)
-X( 4) = ( -3.70147757489015E-01,  2.38760509927706E-01)
-
-X( 5) = ( -4.09666097833457E+00,  4.13936073570615E+00)
-
-PATH NUMBER =      4629
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09607240500394E+00,  5.45295591100226E-01)
-X( 2) = (  2.94756294176865E-01,  1.25693959890764E+00)
-X( 3) = ( -4.07319403787377E-01, -1.38237209926787E+00)
-X( 4) = ( -3.92784525629998E-01,  3.24003248683829E-01)
-
-X( 5) = ( -5.22399519349884E-01,  1.52707467961200E+00)
-
-PATH NUMBER =      4630
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.08756740635990E-01,  7.13528237292736E-01)
-X( 2) = ( -1.06597093746440E-01,  1.30632036187630E+00)
-X( 3) = ( -1.36735446376598E-01, -1.17453360154632E+00)
-X( 4) = ( -4.64918272362753E-01,  3.74752340939830E-01)
-
-X( 5) = (  3.71905980831444E-02,  1.00556522053851E+00)
-
-PATH NUMBER =      4631
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.80522312008557E-01,  6.57718971935133E-01)
-X( 2) = ( -4.45792968885186E-01,  1.08616323608260E+00)
-X( 3) = ( -6.30521205562065E-02, -8.41392060096924E-01)
-X( 4) = ( -5.52796815913728E-01,  3.67261722415789E-01)
-
-X( 5) = (  3.08075247582574E-01,  7.39514152877230E-01)
-
-PATH NUMBER =      4632
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.64953656195755E-01,  4.03981570539134E-01)
-X( 2) = ( -5.64117811519713E-01,  6.99482187459329E-01)
-X( 3) = ( -2.20746673376514E-01, -5.38828104619683E-01)
-X( 4) = ( -6.15300809094201E-01,  3.05036336768058E-01)
-
-X( 5) = (  5.04183453234497E-01,  5.41006599797586E-01)
-
-PATH NUMBER =      4633
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.62917743031138E-01,  7.10425831950273E-02)
-X( 2) = ( -4.06206112747180E-01,  3.27209576138466E-01)
-X( 3) = ( -5.36032070993163E-01, -4.08414772506198E-01)
-X( 4) = ( -6.23183938840520E-01,  2.17192133499339E-01)
-
-X( 5) = (  6.91061526856183E-01,  3.47030117592739E-01)
-
-PATH NUMBER =      4634
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.75367198911086E-01, -1.85312137714199E-01)
-X( 2) = ( -4.59465114162994E-02,  1.43535894306265E-01)
-X( 3) = ( -8.61382771854438E-01, -5.11173911235109E-01)
-X( 4) = ( -5.72757601133155E-01,  1.44832391598638E-01)
-
-X( 5) = (  9.22038168492674E-01,  1.00511458993201E-01)
-
-PATH NUMBER =      4635
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.02894562316672E-01, -2.45131369209750E-01)
-X( 2) = (  3.48091521170727E-01,  2.34404098997606E-01)
-X( 3) = ( -1.04456356715708E+00, -7.99023377754543E-01)
-X( 4) = ( -4.87616839811700E-01,  1.21815038490245E-01)
-
-X( 5) = (  1.32000627713320E+00, -3.42860100657936E-01)
-
-PATH NUMBER =      4636
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.16370622355905E-01,  1.60038675527988E-01)
-X( 2) = (  7.03939122683966E-01,  6.29979972792849E-01)
-X( 3) = ( -7.70214377729136E-01, -1.08819942955544E+00)
-X( 4) = ( -3.93928803700897E-01, -1.89652948759649E-01)
-
-X( 5) = (  5.41500298284689E-01,  1.81266495188167E+00)
-
-PATH NUMBER =      4637
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03215559510339E+00,  4.72202661794817E-01)
-X( 2) = (  6.82875396491833E-01,  1.03381078041875E+00)
-X( 3) = ( -5.18547002688253E-01, -1.31858183227592E+00)
-X( 4) = ( -3.56476597857286E-01, -1.09802588334907E-01)
-
-X( 5) = ( -2.97089658988708E-01,  1.15706802439911E+00)
-
-PATH NUMBER =      4638
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.20196887510608E-01,  7.85759294686368E-01)
-X( 2) = (  4.07162206539334E-01,  1.32962362435068E+00)
-X( 3) = ( -1.77671654565305E-01, -1.33329632123372E+00)
-X( 4) = ( -3.79113365998269E-01, -2.45598495787837E-02)
-
-X( 5) = ( -1.68533584982315E-01,  7.46253761773192E-01)
-
-PATH NUMBER =      4639
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.32881223142653E-01,  9.53991940878878E-01)
-X( 2) = (  5.80881861602870E-03,  1.37900438731934E+00)
-X( 3) = (  9.29123028454748E-02, -1.12545782351217E+00)
-X( 4) = ( -4.51247112731024E-01,  2.61892426772172E-02)
-
-X( 5) = ( -1.78956736796770E-02,  5.94039424329072E-01)
-
-PATH NUMBER =      4640
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.04646794515220E-01,  8.98182675521274E-01)
-X( 2) = ( -3.33387056522718E-01,  1.15884726152565E+00)
-X( 3) = (  1.66595628665866E-01, -7.92316282062778E-01)
-X( 4) = ( -5.39125656281999E-01,  1.86986241531768E-02)
-
-X( 5) = (  1.10801544592636E-01,  5.19546424562027E-01)
-
-PATH NUMBER =      4641
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.90781387024177E-02,  6.44445274125275E-01)
-X( 2) = ( -4.51711899157245E-01,  7.72166212902370E-01)
-X( 3) = (  8.90107584555845E-03, -4.89752326585538E-01)
-X( 4) = ( -6.01629649462471E-01, -4.35267614945542E-02)
-
-X( 5) = (  2.37611417137023E-01,  4.77776884859018E-01)
-
-PATH NUMBER =      4642
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.70422255378012E-02,  3.11506286781169E-01)
-X( 2) = ( -2.93800200384712E-01,  3.99893601581507E-01)
-X( 3) = ( -3.06384321771090E-01, -3.59338994472053E-01)
-X( 4) = ( -6.09512779208791E-01, -1.31370964763273E-01)
-
-X( 5) = (  3.88210952027569E-01,  4.61201200900561E-01)
-
-PATH NUMBER =      4643
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.99491681417749E-01,  5.51515658719428E-02)
-X( 2) = (  6.64594009461692E-02,  2.16219919749305E-01)
-X( 3) = ( -6.31735022632366E-01, -4.62098133200964E-01)
-X( 4) = ( -5.59086441501426E-01, -2.03730706663975E-01)
-
-X( 5) = (  6.08392693128059E-01,  4.97874945914089E-01)
-
-PATH NUMBER =      4644
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.27019044823335E-01, -4.66766562360837E-03)
-X( 2) = (  4.60497433533195E-01,  3.07088124440647E-01)
-X( 3) = ( -8.14915817935006E-01, -7.49947599720398E-01)
-X( 4) = ( -4.73945680179971E-01, -2.26748059772368E-01)
-
-X( 5) = (  9.69773877160885E-01,  7.86078662626446E-01)
-
-PATH NUMBER =      4645
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.27075070254952E-01,  2.31193955940036E-01)
-X( 2) = (  7.43326656246027E-01,  7.57912294309114E-01)
-X( 3) = ( -6.25839297618863E-01, -9.02990474708289E-01)
-X( 4) = ( -1.59404047076859E-01, -4.47880121238736E-01)
-
-X( 5) = (  3.59410150766811E-01,  7.43451656923672E-01)
-
-PATH NUMBER =      4646
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.42860043002437E-01,  5.43357942206865E-01)
-X( 2) = (  7.22262930053893E-01,  1.16174310193501E+00)
-X( 3) = ( -3.74171922577979E-01, -1.13337287742877E+00)
-X( 4) = ( -1.21951841233249E-01, -3.68029760813994E-01)
-
-X( 5) = (  8.49436822300469E-02,  7.06845580836725E-01)
-
-PATH NUMBER =      4647
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.30901335409654E-01,  8.56914575098415E-01)
-X( 2) = (  4.46549740101394E-01,  1.45755594586695E+00)
-X( 3) = ( -3.32965744550305E-02, -1.14808736638658E+00)
-X( 4) = ( -1.44588609374231E-01, -2.82787022057871E-01)
-
-X( 5) = (  2.53635678799584E-02,  5.36785075258011E-01)
-
-PATH NUMBER =      4648
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.43585671041700E-01,  1.02514722129093E+00)
-X( 2) = (  4.51963521780893E-02,  1.50693670883561E+00)
-X( 3) = (  2.37287382955749E-01, -9.40248868665022E-01)
-X( 4) = ( -2.16722356106987E-01, -2.32037929801870E-01)
-
-X( 5) = (  6.20563867173080E-02,  4.32467964748270E-01)
-
-PATH NUMBER =      4649
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.53512424142663E-02,  9.69337955933322E-01)
-X( 2) = ( -2.93999522960658E-01,  1.28677958304191E+00)
-X( 3) = (  3.10970708776140E-01, -6.07107327215631E-01)
-X( 4) = ( -3.04600899657962E-01, -2.39528548325910E-01)
-
-X( 5) = (  1.18760464290827E-01,  3.74768131225558E-01)
-
-PATH NUMBER =      4650
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.00217413398536E-01,  7.15600554537323E-01)
-X( 2) = ( -4.12324365595185E-01,  9.00098534418635E-01)
-X( 3) = (  1.53276155955832E-01, -3.04543371738390E-01)
-X( 4) = ( -3.67104892838434E-01, -3.01753933973641E-01)
-
-X( 5) = (  1.83920020309864E-01,  3.43710766156479E-01)
-
-PATH NUMBER =      4651
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.02253326563153E-01,  3.82661567193216E-01)
-X( 2) = ( -2.54412666822652E-01,  5.27825923097772E-01)
-X( 3) = ( -1.62009241660816E-01, -1.74130039624905E-01)
-X( 4) = ( -3.74988022584753E-01, -3.89598137242360E-01)
-
-X( 5) = (  2.61676159192645E-01,  3.35769116534125E-01)
-
-PATH NUMBER =      4652
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01961293167954E-02,  1.26306846283990E-01)
-X( 2) = (  1.05846934508229E-01,  3.44152241265571E-01)
-X( 3) = ( -4.87359942522092E-01, -2.76889178353816E-01)
-X( 4) = ( -3.24561684877388E-01, -4.61957879143062E-01)
-
-X( 5) = (  3.59788788496850E-01,  3.67511486383854E-01)
-
-PATH NUMBER =      4653
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.37723492722381E-01,  6.64876147884393E-02)
-X( 2) = (  4.99884967095255E-01,  4.35020445956913E-01)
-X( 3) = ( -6.70540737824732E-01, -5.64738644873250E-01)
-X( 4) = ( -2.39420923555934E-01, -4.84975232251454E-01)
-
-X( 5) = (  4.57755332241422E-01,  4.99099688541223E-01)
-
-PATH NUMBER =      4654
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.59724087536344E-01,  9.97464666703375E-02)
-X( 2) = (  6.91265946310315E-01,  8.81231956851765E-01)
-X( 3) = ( -6.34291591154271E-01, -6.68309671389372E-01)
-X( 4) = (  1.86237566462761E-01, -4.94944004055984E-01)
-
-X( 5) = (  3.84426266581443E-01,  4.18583140876313E-01)
-
-PATH NUMBER =      4655
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.75509060283829E-01,  4.11910452937167E-01)
-X( 2) = (  6.70202220118181E-01,  1.28506276447766E+00)
-X( 3) = ( -3.82624216113387E-01, -8.98692074109852E-01)
-X( 4) = (  2.23689772306372E-01, -4.15093643631242E-01)
-
-X( 5) = (  2.55529698873509E-01,  4.92248806212544E-01)
-
-PATH NUMBER =      4656
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.63550352691046E-01,  7.25467085828718E-01)
-X( 2) = (  3.94489030165682E-01,  1.58087560840960E+00)
-X( 3) = ( -4.17488679904389E-02, -9.13406563067660E-01)
-X( 4) = (  2.01053004165389E-01, -3.29850904875118E-01)
-
-X( 5) = (  1.55606551861660E-01,  4.27785724362326E-01)
-
-PATH NUMBER =      4657
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.62346883230916E-02,  8.93699732021228E-01)
-X( 2) = ( -6.86435775762357E-03,  1.63025637137826E+00)
-X( 3) = (  2.28835089420341E-01, -7.05568065346106E-01)
-X( 4) = (  1.28919257432634E-01, -2.79101812619117E-01)
-
-X( 5) = (  1.39499759349782E-01,  3.48857989543165E-01)
-
-PATH NUMBER =      4658
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.51999740304341E-01,  8.37890466663624E-01)
-X( 2) = ( -3.46060232896370E-01,  1.41009924558456E+00)
-X( 3) = (  3.02518415240732E-01, -3.72426523896715E-01)
-X( 4) = (  4.10407138816586E-02, -2.86592431143158E-01)
-
-X( 5) = (  1.59612503215055E-01,  2.93296130695221E-01)
-
-PATH NUMBER =      4659
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.67568396117144E-01,  5.84153065267625E-01)
-X( 2) = ( -4.64385075530897E-01,  1.02341819696129E+00)
-X( 3) = (  1.44823862420425E-01, -6.98625684194736E-02)
-X( 4) = ( -2.14632792988136E-02, -3.48817816790889E-01)
-
-X( 5) = (  1.95186344195088E-01,  2.57080249246392E-01)
-
-PATH NUMBER =      4660
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.69604309281760E-01,  2.51214077923518E-01)
-X( 2) = ( -3.06473376758364E-01,  6.51145585640423E-01)
-X( 3) = ( -1.70461535196224E-01,  6.05507636940113E-02)
-X( 4) = ( -2.93464090451326E-02, -4.36662020059608E-01)
-
-X( 5) = (  2.42824055712160E-01,  2.37225801705803E-01)
-
-PATH NUMBER =      4661
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.57154853401812E-01, -5.14064298570742E-03)
-X( 2) = (  5.37862245725172E-02,  4.67471903808222E-01)
-X( 3) = ( -4.95812236057499E-01, -4.22083750348995E-02)
-X( 4) = (  2.10799286622322E-02, -5.09021761960309E-01)
-
-X( 5) = (  3.04806974013846E-01,  2.40292102149814E-01)
-
-PATH NUMBER =      4662
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.03725100037734E-02, -6.49598744812587E-02)
-X( 2) = (  4.47824257159543E-01,  5.58340108499563E-01)
-X( 3) = ( -6.78993031360140E-01, -3.30057841554333E-01)
-X( 4) = (  1.06220689983687E-01, -5.32039115068702E-01)
-
-X( 5) = (  3.74674329059304E-01,  2.91831034327514E-01)
-
-PATH NUMBER =      4663
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.39414170289323E-01, -1.72798051175697E-01)
-X( 2) = (  5.72116777646093E-01,  9.42236319771709E-01)
-X( 3) = ( -7.91616336253363E-01, -4.93966775658211E-01)
-X( 4) = (  4.81266484564131E-01, -3.08822883384408E-01)
-
-X( 5) = (  4.15473934618624E-01,  2.33174707886335E-01)
-
-PATH NUMBER =      4664
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.55199143036808E-01,  1.39365935091132E-01)
-X( 2) = (  5.51053051453959E-01,  1.34606712739761E+00)
-X( 3) = ( -5.39948961212479E-01, -7.24349178378692E-01)
-X( 4) = (  5.18718690407741E-01, -2.28972522959666E-01)
-
-X( 5) = (  3.73643741119637E-01,  3.38254811278001E-01)
-
-PATH NUMBER =      4665
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.43240435444024E-01,  4.52922567982683E-01)
-X( 2) = (  2.75339861501459E-01,  1.64187997132954E+00)
-X( 3) = ( -1.99073613089531E-01, -7.39063667336499E-01)
-X( 4) = (  4.96081922266759E-01, -1.43729784203542E-01)
-
-X( 5) = (  2.69596391607458E-01,  3.48016062074467E-01)
-
-PATH NUMBER =      4666
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.40752289239299E-02,  6.21155214175193E-01)
-X( 2) = ( -1.26013526421845E-01,  1.69126073429820E+00)
-X( 3) = (  7.15103443212482E-02, -5.31225169614945E-01)
-X( 4) = (  4.23948175534004E-01, -9.29806919475419E-02)
-
-X( 5) = (  2.17024498164910E-01,  2.93555466015177E-01)
-
-PATH NUMBER =      4667
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.72309657551363E-01,  5.65345948817589E-01)
-X( 2) = ( -4.65209401560592E-01,  1.47110360850451E+00)
-X( 3) = (  1.45193670141640E-01, -1.98083628165554E-01)
-X( 4) = (  3.36069631983028E-01, -1.00471310471582E-01)
-
-X( 5) = (  2.09898086624424E-01,  2.39290151546108E-01)
-
-PATH NUMBER =      4668
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.87878313364166E-01,  3.11608547421590E-01)
-X( 2) = ( -5.83534244195119E-01,  1.08442255988123E+00)
-X( 3) = ( -1.25008826786680E-02,  1.04480327311687E-01)
-X( 4) = (  2.73565638802557E-01, -1.62696696119313E-01)
-
-X( 5) = (  2.25378597002872E-01,  1.97151460837267E-01)
-
-PATH NUMBER =      4669
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.89914226528782E-01, -2.13304399225166E-02)
-X( 2) = ( -4.25622545422586E-01,  7.12149948560368E-01)
-X( 3) = ( -3.27786280295317E-01,  2.34893659425172E-01)
-X( 4) = (  2.65682509056237E-01, -2.50540899388032E-01)
-
-X( 5) = (  2.55533396072345E-01,  1.66478718955824E-01)
-
-PATH NUMBER =      4670
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.77464770648834E-01, -2.77685160831742E-01)
-X( 2) = ( -6.53629440917051E-02,  5.28476266728166E-01)
-X( 3) = ( -6.53136981156592E-01,  1.32134520696261E-01)
-X( 4) = (  3.16108846763602E-01, -3.22900641288733E-01)
-
-X( 5) = (  3.00842436467342E-01,  1.49814157884535E-01)
-
-PATH NUMBER =      4671
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.99374072432480E-02, -3.37504392327294E-01)
-X( 2) = (  3.28675088495321E-01,  6.19344471419508E-01)
-X( 3) = ( -8.36317776459233E-01, -1.55714945823173E-01)
-X( 4) = (  4.01249608085057E-01, -3.45917994397126E-01)
-
-X( 5) = (  3.62573440905842E-01,  1.61516537135709E-01)
-
-PATH NUMBER =      4672
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.22439665889561E-01, -4.58912988702992E-01)
-X( 2) = (  4.41630370466858E-01,  9.12380763670733E-01)
-X( 3) = ( -1.02419953621449E+00, -4.61538766032875E-01)
-X( 4) = (  5.87635397566427E-01,  2.33950999079146E-02)
-
-X( 5) = (  4.49177427986799E-01,  8.57181705106312E-02)
-
-PATH NUMBER =      4673
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.38224638637046E-01, -1.46749002436162E-01)
-X( 2) = (  4.20566644274724E-01,  1.31621157129663E+00)
-X( 3) = ( -7.72532161173611E-01, -6.91921168753355E-01)
-X( 4) = (  6.25087603410037E-01,  1.03245460332656E-01)
-
-X( 5) = (  4.82204627769849E-01,  1.92562310674276E-01)
-
-PATH NUMBER =      4674
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.26265931044262E-01,  1.66807630455389E-01)
-X( 2) = (  1.44853454322225E-01,  1.61202441522856E+00)
-X( 3) = ( -4.31656813050662E-01, -7.06635657711162E-01)
-X( 4) = (  6.02450835269055E-01,  1.88488199088780E-01)
-
-X( 5) = (  3.96588624948566E-01,  2.73497440885663E-01)
-
-PATH NUMBER =      4675
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.89502666763086E-02,  3.35040276647899E-01)
-X( 2) = ( -2.56499933601079E-01,  1.66140517819723E+00)
-X( 3) = ( -1.61072855639883E-01, -4.98797159989609E-01)
-X( 4) = (  5.30317088536300E-01,  2.39237291344780E-01)
-
-X( 5) = (  3.08879553495085E-01,  2.51616433078707E-01)
-
-PATH NUMBER =      4676
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.89284161951125E-01,  2.79231011290295E-01)
-X( 2) = ( -5.95695808739826E-01,  1.44124805240353E+00)
-X( 3) = ( -8.73895298194920E-02, -1.65655618540217E-01)
-X( 4) = (  4.42438544985325E-01,  2.31746672820740E-01)
-
-X( 5) = (  2.72999552069275E-01,  1.99314040389621E-01)
-
-PATH NUMBER =      4677
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.04852817763927E-01,  2.54936098942957E-02)
-X( 2) = ( -7.14020651374353E-01,  1.05456700378025E+00)
-X( 3) = ( -2.45084082639800E-01,  1.36908336937023E-01)
-X( 4) = (  3.79934551804853E-01,  1.69521287173009E-01)
-
-X( 5) = (  2.69206746543714E-01,  1.50368885563249E-01)
-
-PATH NUMBER =      4678
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.06888730928544E-01, -3.07445377449811E-01)
-X( 2) = ( -5.56108952601820E-01,  6.82294392459391E-01)
-X( 3) = ( -5.60369480256449E-01,  2.67321669050509E-01)
-X( 4) = (  3.72051422058533E-01,  8.16770839042906E-02)
-
-X( 5) = (  2.84612370593755E-01,  1.08879490875553E-01)
-
-PATH NUMBER =      4679
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.94439275048596E-01, -5.63800098359037E-01)
-X( 2) = ( -1.95849351270940E-01,  4.98620710627190E-01)
-X( 3) = ( -8.85720181117724E-01,  1.64562530321597E-01)
-X( 4) = (  4.22477759765898E-01,  9.31734200358908E-03)
-
-X( 5) = (  3.17478157447912E-01,  7.55087510452229E-02)
-
-PATH NUMBER =      4680
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.30880883569905E-02, -6.23619329854588E-01)
-X( 2) = (  1.98188681316086E-01,  5.89488915318531E-01)
-X( 3) = ( -1.06890097642036E+00, -1.23286936197836E-01)
-X( 4) = (  5.07618521087353E-01, -1.37000111048036E-02)
-
-X( 5) = (  3.72775821045464E-01,  5.80525378915950E-02)
-
-PATH NUMBER =      4681
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.69952022220105E-01, -6.24721986829192E-01)
-X( 2) = (  3.60862764886654E-01,  8.05635035056028E-01)
-X( 3) = ( -1.22321292690151E+00, -5.86199068614239E-01)
-X( 4) = (  4.55573108917088E-01,  3.46261459246894E-01)
-
-X( 5) = (  4.92510655151549E-01, -6.59738099789194E-02)
-
-PATH NUMBER =      4682
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.85736994967591E-01, -3.12558000562363E-01)
-X( 2) = (  3.39799038694520E-01,  1.20946584268193E+00)
-X( 3) = ( -9.71545551860629E-01, -8.16581471334719E-01)
-X( 4) = (  4.93025314760698E-01,  4.26111819671636E-01)
-
-X( 5) = (  6.11253137198538E-01,  1.38826760471913E-02)
-
-PATH NUMBER =      4683
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.73778287374808E-01,  9.98632329187938E-04)
-X( 2) = (  6.40858487420210E-02,  1.50527868661386E+00)
-X( 3) = ( -6.30670203737680E-01, -8.31295960292526E-01)
-X( 4) = (  4.70388546619715E-01,  5.11354558427759E-01)
-
-X( 5) = (  5.82421886768722E-01,  1.87728035247631E-01)
-
-PATH NUMBER =      4684
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.86462623006854E-01,  1.69231278521698E-01)
-X( 2) = ( -3.37267539181283E-01,  1.55465944958252E+00)
-X( 3) = ( -3.60086246326901E-01, -6.23457462570973E-01)
-X( 4) = (  3.98254799886960E-01,  5.62103650683760E-01)
-
-X( 5) = (  4.43897973127640E-01,  2.24888894233369E-01)
-
-PATH NUMBER =      4685
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.17718056205797E-02,  1.13422013164095E-01)
-X( 2) = ( -6.76463414320030E-01,  1.33450232378882E+00)
-X( 3) = ( -2.86402920506510E-01, -2.90315921121582E-01)
-X( 4) = (  3.10376256335985E-01,  5.54613032159720E-01)
-
-X( 5) = (  3.64236913686986E-01,  1.73873066233154E-01)
-
-PATH NUMBER =      4686
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.57340461433382E-01, -1.40315388231904E-01)
-X( 2) = ( -7.94788256954557E-01,  9.47821275165549E-01)
-X( 3) = ( -4.44097473326817E-01,  1.22480343556591E-02)
-X( 4) = (  2.47872263155513E-01,  4.92387646511989E-01)
-
-X( 5) = (  3.35205814792925E-01,  1.13202908781395E-01)
-
-PATH NUMBER =      4687
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.59376374597999E-01, -4.73254375576011E-01)
-X( 2) = ( -6.36876558182024E-01,  5.75548663844686E-01)
-X( 3) = ( -7.59382870943466E-01,  1.42661366469144E-01)
-X( 4) = (  2.39989133409194E-01,  4.04543443243269E-01)
-
-X( 5) = (  3.33794926258580E-01,  5.67967977487807E-02)
-
-PATH NUMBER =      4688
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.69269187180510E-02, -7.29609096485237E-01)
-X( 2) = ( -2.76616956851143E-01,  3.91874982012485E-01)
-X( 3) = ( -1.08473357180474E+00,  3.99022277402334E-02)
-X( 4) = (  2.90415471116559E-01,  3.32183701342568E-01)
-
-X( 5) = (  3.53593929751964E-01,  3.99290498606428E-03)
-
-PATH NUMBER =      4689
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.80600444687535E-01, -7.89428327980788E-01)
-X( 2) = (  1.17421075735882E-01,  4.82743186703826E-01)
-X( 3) = ( -1.26791436710738E+00, -2.47947238779200E-01)
-X( 4) = (  3.75556232438013E-01,  3.09166348234175E-01)
-
-X( 5) = (  4.00798610372302E-01, -4.37668846658525E-02)
-
-PATH NUMBER =      4690
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.66137456960464E-01, -5.92641172569298E-01)
-X( 2) = (  3.67606021188408E-01,  6.71946646693042E-01)
-X( 3) = ( -1.29553593102449E+00, -8.09617742379545E-01)
-X( 4) = (  1.46873031183989E-01,  5.08703436837930E-01)
-
-X( 5) = (  5.65157067490400E-01, -2.69382420558583E-01)
-
-PATH NUMBER =      4691
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.81922429707949E-01, -2.80477186302469E-01)
-X( 2) = (  3.46542294996274E-01,  1.07577745431894E+00)
-X( 3) = ( -1.04386855598361E+00, -1.04000014510003E+00)
-X( 4) = (  1.84325237027599E-01,  5.88553797262672E-01)
-
-X( 5) = (  8.21129503936200E-01, -2.90508619953574E-01)
-
-PATH NUMBER =      4692
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.69963722115166E-01,  3.30794465890817E-02)
-X( 2) = (  7.08291050437747E-02,  1.37159029825087E+00)
-X( 3) = ( -7.02993207860660E-01, -1.05471463405783E+00)
-X( 4) = (  1.61688468886617E-01,  6.73796536018796E-01)
-
-X( 5) = (  9.90901490112291E-01,  8.03201632724154E-02)
-
-PATH NUMBER =      4693
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.82648057747212E-01,  2.01312092781592E-01)
-X( 2) = ( -3.30524282879530E-01,  1.42097106121954E+00)
-X( 3) = ( -4.32409250449881E-01, -8.46876136336279E-01)
-X( 4) = (  8.95547221538612E-02,  7.24545628274796E-01)
-
-X( 5) = (  6.98299835217307E-01,  2.74918553887407E-01)
-
-PATH NUMBER =      4694
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.54413629119779E-01,  1.45502827423989E-01)
-X( 2) = ( -6.69720158018276E-01,  1.20081393542584E+00)
-X( 3) = ( -3.58725924629489E-01, -5.13734594886888E-01)
-X( 4) = (  1.67617860288630E-03,  7.17055009750756E-01)
-
-X( 5) = (  5.17572969912148E-01,  1.99042101774315E-01)
-
-PATH NUMBER =      4695
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.88449733069759E-02, -1.08234573972011E-01)
-X( 2) = ( -7.88045000652803E-01,  8.14132886802564E-01)
-X( 3) = ( -5.16420477449797E-01, -2.11170639409647E-01)
-X( 4) = ( -6.08278145775858E-02,  6.54829624103025E-01)
-
-X( 5) = (  4.47344599303245E-01,  1.01943688409302E-01)
-
-PATH NUMBER =      4696
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.68090601423594E-02, -4.41173561316117E-01)
-X( 2) = ( -6.30133301880271E-01,  4.41860275481700E-01)
-X( 3) = ( -8.31705875066446E-01, -8.07573072961618E-02)
-X( 4) = ( -6.87109443239051E-02,  5.66985420834306E-01)
-
-X( 5) = (  4.23517252740999E-01,  1.35288832699505E-02)
-
-PATH NUMBER =      4697
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.49258516022307E-01, -6.97528282225343E-01)
-X( 2) = ( -2.69873700549390E-01,  2.58186593649499E-01)
-X( 3) = ( -1.15705657592772E+00, -1.83516446025073E-01)
-X( 4) = ( -1.82846066165402E-02,  4.94625678933605E-01)
-
-X( 5) = (  4.27135017012633E-01, -7.28741023096810E-02)
-
-PATH NUMBER =      4698
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.76785879427893E-01, -7.57347513720895E-01)
-X( 2) = (  1.24164332037636E-01,  3.49054798340841E-01)
-X( 3) = ( -1.34023737123036E+00, -4.71365912544506E-01)
-X( 4) = (  6.68561547049145E-02,  4.71608325825212E-01)
-
-X( 5) = (  4.62698462477232E-01, -1.66738040687767E-01)
-
-PATH NUMBER =      4699
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11161452422999E+00, -4.29142696682099E-01)
-X( 2) = (  1.67262966610892E-01,  6.39267292613649E-01)
-X( 3) = ( -1.01818246182749E+00, -1.52064264429617E+00)
-X( 4) = ( -3.24059772690574E-01,  6.62392859814238E-01)
-
-X( 5) = (  2.24435850759841E-01, -5.39725481311535E-01)
-
-PATH NUMBER =      4700
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22739949697747E+00, -1.16978710415269E-01)
-X( 2) = (  1.46199240418758E-01,  1.04309810023955E+00)
-X( 3) = ( -7.66515086786603E-01, -1.75102504701665E+00)
-X( 4) = ( -2.86607566846964E-01,  7.42243220238980E-01)
-
-X( 5) = (  1.73415534784809E-01, -7.43678308116230E-01)
-
-PATH NUMBER =      4701
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11544078938469E+00,  1.96577922476281E-01)
-X( 2) = ( -1.29513949533741E-01,  1.33891094417148E+00)
-X( 3) = ( -4.25639738663655E-01, -1.76573953597446E+00)
-X( 4) = ( -3.09244334987946E-01,  8.27485958995104E-01)
-
-X( 5) = (  3.08563257176037E-01, -1.15006987088819E+00)
-
-PATH NUMBER =      4702
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.28125125016736E-01,  3.64810568668792E-01)
-X( 2) = ( -5.30867337457046E-01,  1.38829170714014E+00)
-X( 3) = ( -1.55055781252875E-01, -1.55790103825290E+00)
-X( 4) = ( -3.81378081720702E-01,  8.78235051251104E-01)
-
-X( 5) = (  1.22826922415075E+00, -1.09152551623781E+00)
-
-PATH NUMBER =      4703
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.99890696389302E-01,  3.09001303311188E-01)
-X( 2) = ( -8.70063212595792E-01,  1.16813458134645E+00)
-X( 3) = ( -8.13724554324840E-02, -1.22475949680351E+00)
-X( 4) = ( -4.69256625271677E-01,  8.70744432727063E-01)
-
-X( 5) = (  1.03618471679048E+00, -2.82753798662875E-01)
-
-PATH NUMBER =      4704
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.84322040576500E-01,  5.52639019151891E-02)
-X( 2) = ( -9.88388055230319E-01,  7.81453532723171E-01)
-X( 3) = ( -2.39067008252791E-01, -9.22195541326271E-01)
-X( 4) = ( -5.31760618452149E-01,  8.08519047079333E-01)
-
-X( 5) = (  6.82884299286380E-01, -2.07971684465203E-01)
-
-PATH NUMBER =      4705
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.82286127411883E-01, -2.77675085428918E-01)
-X( 2) = ( -8.30476356457786E-01,  4.09180921402307E-01)
-X( 3) = ( -5.54352405869441E-01, -7.91782209212786E-01)
-X( 4) = ( -5.39643748198468E-01,  7.20674843810614E-01)
-
-X( 5) = (  5.00507658144969E-01, -2.59839814088058E-01)
-
-PATH NUMBER =      4706
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.94735583291831E-01, -5.34029806338144E-01)
-X( 2) = ( -4.70216755126905E-01,  2.25507239570106E-01)
-X( 3) = ( -8.79703106730716E-01, -8.94541347941697E-01)
-X( 4) = ( -4.89217410491103E-01,  6.48315101909912E-01)
-
-X( 5) = (  3.86026088569018E-01, -3.31758331699944E-01)
-
-PATH NUMBER =      4707
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.22262946697417E-01, -5.93849037833695E-01)
-X( 2) = ( -7.61787225398792E-02,  3.16375444261448E-01)
-X( 3) = ( -1.06288390203336E+00, -1.18239081446113E+00)
-X( 4) = ( -4.04076649169648E-01,  6.25297748801520E-01)
-
-X( 5) = (  2.98862542640005E-01, -4.19120529961384E-01)
-
-PATH NUMBER =      4708
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13145315061805E+00, -1.31886209286201E-01)
-X( 2) = (  3.00091282126808E-01,  6.22693358685704E-01)
-X( 3) = ( -8.10716777605062E-01, -1.63066314503372E+00)
-X( 4) = ( -5.37639097580855E-01,  3.86590383292507E-01)
-
-X( 5) = (  1.17776646671467E-01, -8.86716625228057E-01)
-
-PATH NUMBER =      4709
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24723812336554E+00,  1.80277776980629E-01)
-X( 2) = (  2.79027555934674E-01,  1.02652416631160E+00)
-X( 3) = ( -5.59049402564177E-01, -1.86104554775420E+00)
-X( 4) = ( -5.00186891737244E-01,  4.66440743717248E-01)
-
-X( 5) = ( -3.07088032062905E-01, -1.16287137830385E+00)
-
-PATH NUMBER =      4710
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13527941577275E+00,  4.93834409872179E-01)
-X( 2) = (  3.31436598217478E-03,  1.32233701024354E+00)
-X( 3) = ( -2.18174054441229E-01, -1.87576003671201E+00)
-X( 4) = ( -5.22823659878226E-01,  5.51683482473372E-01)
-
-X( 5) = ( -1.45531644605384E+00, -1.69268053531810E+00)
-
-PATH NUMBER =      4711
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.47963751404798E-01,  6.62067056064690E-01)
-X( 2) = ( -3.98039021941130E-01,  1.37171777321220E+00)
-X( 3) = (  5.24099029695498E-02, -1.66792153899046E+00)
-X( 4) = ( -5.94957406610982E-01,  6.02432574729373E-01)
-
-X( 5) = ( -7.28979716971387E+00,  8.94165592778023E+00)
-
-PATH NUMBER =      4712
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.19729322777365E-01,  6.06257790707086E-01)
-X( 2) = ( -7.37234897079877E-01,  1.15156064741850E+00)
-X( 3) = (  1.26093228789941E-01, -1.33477999754106E+00)
-X( 4) = ( -6.82835950161957E-01,  5.94941956205332E-01)
-
-X( 5) = (  1.92166663940510E+00,  1.11950322474569E+00)
-
-PATH NUMBER =      4713
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.04160666964562E-01,  3.52520389311087E-01)
-X( 2) = ( -8.55559739714404E-01,  7.64879598795224E-01)
-X( 3) = ( -3.16013240303664E-02, -1.03221604206382E+00)
-X( 4) = ( -7.45339943342429E-01,  5.32716570557601E-01)
-
-X( 5) = (  1.19726301606205E+00,  9.12922200000958E-02)
-
-PATH NUMBER =      4714
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.02124753799946E-01,  1.95814019669801E-02)
-X( 2) = ( -6.97648040941870E-01,  3.92606987474362E-01)
-X( 3) = ( -3.46886721647016E-01, -9.01802709950338E-01)
-X( 4) = ( -7.53223073088748E-01,  4.44872367288883E-01)
-
-X( 5) = (  8.50072102144678E-01, -2.76082468852585E-01)
-
-PATH NUMBER =      4715
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.14574209679894E-01, -2.36773318942246E-01)
-X( 2) = ( -3.37388439610990E-01,  2.08933305642160E-01)
-X( 3) = ( -6.72237422508291E-01, -1.00456184867925E+00)
-X( 4) = ( -7.02796735381384E-01,  3.72512625388181E-01)
-
-X( 5) = (  6.06766892381813E-01, -5.00783825603032E-01)
-
-PATH NUMBER =      4716
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.42101573085480E-01, -2.96592550437797E-01)
-X( 2) = (  5.66495929760365E-02,  2.99801510333502E-01)
-X( 3) = ( -8.55418217810932E-01, -1.29241131519868E+00)
-X( 4) = ( -6.17655974059929E-01,  3.49495272279788E-01)
-
-X( 5) = (  3.82818951335065E-01, -6.87536548279642E-01)
-
-PATH NUMBER =      4717
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.55577633124714E-01,  1.08577494299941E-01)
-X( 2) = (  4.12497194489277E-01,  6.95377384128744E-01)
-X( 3) = ( -5.81069028382989E-01, -1.58158736699958E+00)
-X( 4) = ( -5.23967937949126E-01,  3.80272850298938E-02)
-
-X( 5) = (  3.33116969283906E-01, -2.33659167791632E+00)
-
-PATH NUMBER =      4718
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07136260587220E+00,  4.20741480566770E-01)
-X( 2) = (  3.91433468297142E-01,  1.09920819175464E+00)
-X( 3) = ( -3.29401653342105E-01, -1.81196976972006E+00)
-X( 4) = ( -4.86515732105515E-01,  1.17877645454635E-01)
-
-X( 5) = ( -2.90775253992471E+00, -1.11701765422969E+00)
-
-PATH NUMBER =      4719
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.59403898279415E-01,  7.34298113458321E-01)
-X( 2) = (  1.15720278344643E-01,  1.39502103568658E+00)
-X( 3) = (  1.14736947808433E-02, -1.82668425867786E+00)
-X( 4) = ( -5.09152500246498E-01,  2.03120384210759E-01)
-
-X( 5) = ( -1.42739379866851E+00,  1.31313665502178E+00)
-
-PATH NUMBER =      4720
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.72088233911461E-01,  9.02530759650831E-01)
-X( 2) = ( -2.85633109578662E-01,  1.44440179865524E+00)
-X( 3) = (  2.82057652191623E-01, -1.61884576095631E+00)
-X( 4) = ( -5.81286246979253E-01,  2.53869476466760E-01)
-
-X( 5) = ( -2.40288758260633E-01,  1.27766681848236E+00)
-
-PATH NUMBER =      4721
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.43853805284028E-01,  8.46721494293228E-01)
-X( 2) = ( -6.24828984717408E-01,  1.22424467286154E+00)
-X( 3) = (  3.55740978012014E-01, -1.28570421950692E+00)
-X( 4) = ( -6.69164790530228E-01,  2.46378857942720E-01)
-
-X( 5) = (  3.24460895899363E-01,  9.86011293937718E-01)
-
-PATH NUMBER =      4722
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.28285149471226E-01,  5.92984092897228E-01)
-X( 2) = ( -7.43153827351935E-01,  8.37563624238265E-01)
-X( 3) = (  1.98046425191706E-01, -9.83140264029677E-01)
-X( 4) = ( -7.31668783710700E-01,  1.84153472294989E-01)
-
-X( 5) = (  6.64777686964848E-01,  6.72885782566032E-01)
-
-PATH NUMBER =      4723
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26249236306609E-01,  2.60045105553122E-01)
-X( 2) = ( -5.85242128579402E-01,  4.65291012917403E-01)
-X( 3) = ( -1.17238972424943E-01, -8.52726931916193E-01)
-X( 4) = ( -7.39551913457020E-01,  9.63092690262698E-02)
-
-X( 5) = (  9.11335281469415E-01,  3.20178608484361E-01)
-
-PATH NUMBER =      4724
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.38698692186557E-01,  3.69038464389578E-03)
-X( 2) = ( -2.24982527248521E-01,  2.81617331085201E-01)
-X( 3) = ( -4.42589673286218E-01, -9.55486070645103E-01)
-X( 4) = ( -6.89125575749655E-01,  2.39495271255681E-02)
-
-X( 5) = (  1.09994729461790E+00, -1.48227893248209E-01)
-
-PATH NUMBER =      4725
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.66226055592143E-01, -5.61288468516553E-02)
-X( 2) = (  1.69055505338505E-01,  3.72485535776543E-01)
-X( 3) = ( -6.25770468588859E-01, -1.24333553716454E+00)
-X( 4) = ( -6.03984814428200E-01,  9.32174017175482E-04)
-
-X( 5) = (  1.15538657858611E+00, -9.17493618190719E-01)
-
-PATH NUMBER =      4726
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.66282081023760E-01,  1.79732774711988E-01)
-X( 2) = (  4.51884728051336E-01,  8.23309705645010E-01)
-X( 3) = ( -4.36693948272716E-01, -1.39637841215243E+00)
-X( 4) = ( -2.89443181325088E-01, -2.20199887449192E-01)
-
-X( 5) = (  2.00971370104240E+00,  7.58289028015586E-01)
-
-PATH NUMBER =      4727
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.82067053771245E-01,  4.91896760978817E-01)
-X( 2) = (  4.30821001859202E-01,  1.22714051327091E+00)
-X( 3) = ( -1.85026573231832E-01, -1.62676081487291E+00)
-X( 4) = ( -2.51990975481477E-01, -1.40349527024450E-01)
-
-X( 5) = (  3.37518286328371E-01,  2.07889171511995E+00)
-
-PATH NUMBER =      4728
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.70108346178462E-01,  8.05453393870368E-01)
-X( 2) = (  1.55107811906703E-01,  1.52295335720284E+00)
-X( 3) = (  1.55848774891117E-01, -1.64147530383072E+00)
-X( 4) = ( -2.74627743622460E-01, -5.51067882683267E-02)
-
-X( 5) = ( -4.21930431739026E-03,  1.07194563710271E+00)
-
-PATH NUMBER =      4729
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.82792681810508E-01,  9.73686040062878E-01)
-X( 2) = ( -2.46245576016602E-01,  1.57233412017150E+00)
-X( 3) = (  4.26432732301896E-01, -1.43363680610916E+00)
-X( 4) = ( -3.46761490355215E-01, -4.35769601232605E-03)
-
-X( 5) = (  1.26310354822975E-01,  7.24391947309921E-01)
-
-PATH NUMBER =      4730
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.45582531830747E-02,  9.17876774705275E-01)
-X( 2) = ( -5.85441451155348E-01,  1.35217699437781E+00)
-X( 3) = (  5.00116058122287E-01, -1.10049526465977E+00)
-X( 4) = ( -4.34640033906191E-01, -1.18483145363663E-02)
-
-X( 5) = (  2.50251982614497E-01,  5.54145207979374E-01)
-
-PATH NUMBER =      4731
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.61010402629728E-01,  6.64139373309276E-01)
-X( 2) = ( -7.03766293789875E-01,  9.65495945754531E-01)
-X( 3) = (  3.42421505301980E-01, -7.97931309182530E-01)
-X( 4) = ( -4.97144027086663E-01, -7.40737001840973E-02)
-
-X( 5) = (  3.68478232595489E-01,  4.39975719357972E-01)
-
-PATH NUMBER =      4732
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.63046315794344E-01,  3.31200385965169E-01)
-X( 2) = ( -5.45854595017342E-01,  5.93223334433668E-01)
-X( 3) = (  2.71361076853307E-02, -6.67517977069045E-01)
-X( 4) = ( -5.05027156832982E-01, -1.61917903452817E-01)
-
-X( 5) = (  5.03069442853202E-01,  3.44782359318663E-01)
-
-PATH NUMBER =      4733
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.94031400856038E-02,  7.48456650559433E-02)
-X( 2) = ( -1.85594993686461E-01,  4.09549652601467E-01)
-X( 3) = ( -2.98214593175944E-01, -7.70277115797956E-01)
-X( 4) = ( -4.54600819125617E-01, -2.34277645353518E-01)
-
-X( 5) = (  6.95409083895495E-01,  2.54039992144665E-01)
-
-PATH NUMBER =      4734
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.76930503491190E-01,  1.50264335603921E-02)
-X( 2) = (  2.08443038900565E-01,  5.00417857292809E-01)
-X( 3) = ( -4.81395388478585E-01, -1.05812658231739E+00)
-X( 4) = ( -3.69460057804162E-01, -2.57294998461911E-01)
-
-X( 5) = (  1.06880818636917E+00,  1.91334959982697E-01)
-
-PATH NUMBER =      4735
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.98931098305152E-01,  4.82852854422909E-02)
-X( 2) = (  3.99824018115625E-01,  9.46629368187661E-01)
-X( 3) = ( -4.45146241808123E-01, -1.16169760883351E+00)
-X( 4) = (  5.61984322145319E-02, -2.67263770266440E-01)
-
-X( 5) = (  8.17458149331499E-01,  2.75303917861574E-01)
-
-PATH NUMBER =      4736
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.14716071052638E-01,  3.60449271709120E-01)
-X( 2) = (  3.78760291923491E-01,  1.35046017581356E+00)
-X( 3) = ( -1.93478866767239E-01, -1.39208001155399E+00)
-X( 4) = (  9.36506380581421E-02, -1.87413409841699E-01)
-
-X( 5) = (  7.38347456796554E-01,  6.73557297102766E-01)
-
-PATH NUMBER =      4737
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.02757363459854E-01,  6.74005904600671E-01)
-X( 2) = (  1.03047101970992E-01,  1.64627301974549E+00)
-X( 3) = (  1.47396481355709E-01, -1.40679450051180E+00)
-X( 4) = (  7.10138699171597E-02, -1.02170671085575E-01)
-
-X( 5) = (  3.80931268726197E-01,  6.57682372017277E-01)
-
-PATH NUMBER =      4738
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15441699091900E-01,  8.42238550793181E-01)
-X( 2) = ( -2.98306285952314E-01,  1.69565378271415E+00)
-X( 3) = (  4.17980438766489E-01, -1.19895600279025E+00)
-X( 4) = ( -1.11987681559552E-03, -5.14215788295749E-02)
-
-X( 5) = (  2.80893965953727E-01,  4.84090596781235E-01)
-
-PATH NUMBER =      4739
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.12792729535533E-01,  7.86429285435578E-01)
-X( 2) = ( -6.37502161091060E-01,  1.47549665692046E+00)
-X( 3) = (  4.91663764586880E-01, -8.65814461340854E-01)
-X( 4) = ( -8.89984203665705E-02, -5.89121973536152E-02)
-
-X( 5) = (  2.85038327124688E-01,  3.62581981591573E-01)
-
-PATH NUMBER =      4740
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.28361385348336E-01,  5.32691884039578E-01)
-X( 2) = ( -7.55827003725587E-01,  1.08881560829718E+00)
-X( 3) = (  3.33969211766572E-01, -5.63250505863613E-01)
-X( 4) = ( -1.51502413547042E-01, -1.21137583001346E-01)
-
-X( 5) = (  3.20975147861992E-01,  2.77678504718946E-01)
-
-PATH NUMBER =      4741
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.30397298512952E-01,  1.99752896695472E-01)
-X( 2) = ( -5.97915304953054E-01,  7.16542996976319E-01)
-X( 3) = (  1.86838141499234E-02, -4.32837173750128E-01)
-X( 4) = ( -1.59385543293361E-01, -2.08981786270065E-01)
-
-X( 5) = (  3.77064748408452E-01,  2.11880512949702E-01)
-
-PATH NUMBER =      4742
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.17947842633004E-01, -5.66018242137543E-02)
-X( 2) = ( -2.37655703622173E-01,  5.32869315144118E-01)
-X( 3) = ( -3.06666886711352E-01, -5.35596312479039E-01)
-X( 4) = ( -1.08959205585997E-01, -2.81341528170766E-01)
-
-X( 5) = (  4.62196002297979E-01,  1.60094608832067E-01)
-
-PATH NUMBER =      4743
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09579520772582E-01, -1.16421055709305E-01)
-X( 2) = (  1.56382328964853E-01,  6.23737519835459E-01)
-X( 3) = ( -4.89847682013992E-01, -8.23445778998473E-01)
-X( 4) = ( -2.38184442645424E-02, -3.04358881279159E-01)
-
-X( 5) = (  6.03886004422089E-01,  1.41561390901055E-01)
-
-PATH NUMBER =      4744
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.78621181058130E-01, -2.24259232403745E-01)
-X( 2) = (  2.80674849451402E-01,  1.00763373110761E+00)
-X( 3) = ( -6.02470986907216E-01, -9.87354713102351E-01)
-X( 4) = (  3.51227350315902E-01, -8.11426495948644E-02)
-
-X( 5) = (  5.73140444307139E-01,  3.33978182607420E-02)
-
-PATH NUMBER =      4745
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.94406153805616E-01,  8.79047538630847E-02)
-X( 2) = (  2.59611123259268E-01,  1.41146453873350E+00)
-X( 3) = ( -3.50803611866332E-01, -1.21773711582283E+00)
-X( 4) = (  3.88679556159513E-01, -1.29228917012251E-03)
-
-X( 5) = (  6.67253438676737E-01,  1.96226597938829E-01)
-
-PATH NUMBER =      4746
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.82447446212832E-01,  4.01461386754635E-01)
-X( 2) = ( -1.61020666932314E-02,  1.70727738266544E+00)
-X( 3) = ( -9.92826374338363E-03, -1.23245160478064E+00)
-X( 4) = (  3.66042788018530E-01,  8.39504495860013E-02)
-
-X( 5) = (  5.31400474229941E-01,  3.55670578797196E-01)
-
-PATH NUMBER =      4747
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.86821815512125E-03,  5.69694032947146E-01)
-X( 2) = ( -4.17455454616536E-01,  1.75665814563410E+00)
-X( 3) = (  2.60655693667396E-01, -1.02461310705909E+00)
-X( 4) = (  2.93909041285775E-01,  1.34699541842002E-01)
-
-X( 5) = (  3.84988982839404E-01,  3.19812974195762E-01)
-
-PATH NUMBER =      4748
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.33102646782555E-01,  5.13884767589542E-01)
-X( 2) = ( -7.56651329755282E-01,  1.53650101984040E+00)
-X( 3) = (  3.34339019487787E-01, -6.91471565609694E-01)
-X( 4) = (  2.06030497734800E-01,  1.27208923317962E-01)
-
-X( 5) = (  3.30975603476420E-01,  2.39995926108973E-01)
-
-PATH NUMBER =      4749
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.48671302595357E-01,  2.60147366193543E-01)
-X( 2) = ( -8.74976172389809E-01,  1.14981997121713E+00)
-X( 3) = (  1.76644466667479E-01, -3.88907610132453E-01)
-X( 4) = (  1.43526504554327E-01,  6.49835376702306E-02)
-
-X( 5) = (  3.23520847235705E-01,  1.70016392549776E-01)
-
-PATH NUMBER =      4750
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.50707215759974E-01, -7.27916211505636E-02)
-X( 2) = ( -7.17064473617276E-01,  7.77547359896264E-01)
-X( 3) = ( -1.38640930949170E-01, -2.58494278018968E-01)
-X( 4) = (  1.35643374808008E-01, -2.28606655984886E-02)
-
-X( 5) = (  3.40502493381681E-01,  1.10765111263458E-01)
-
-PATH NUMBER =      4751
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.38257759880025E-01, -3.29146342059790E-01)
-X( 2) = ( -3.56804872286395E-01,  5.93873678064062E-01)
-X( 3) = ( -4.63991631810445E-01, -3.61253416747879E-01)
-X( 4) = (  1.86069712515373E-01, -9.52204074991903E-02)
-
-X( 5) = (  3.79602245987034E-01,  5.91022420695044E-02)
-
-PATH NUMBER =      4752
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07303964744398E-02, -3.88965573555341E-01)
-X( 2) = (  3.72331603006306E-02,  6.84741882755404E-01)
-X( 3) = ( -6.47172427113085E-01, -6.49102883267313E-01)
-X( 4) = (  2.71210473836828E-01, -1.18237760607583E-01)
-
-X( 5) = (  4.51605209909964E-01,  2.02869035049558E-02)
-
-PATH NUMBER =      4753
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.61646676658369E-01, -5.10374169931038E-01)
-X( 2) = (  1.50188442272168E-01,  9.77778175006629E-01)
-X( 3) = ( -8.35054186868348E-01, -9.54926703477014E-01)
-X( 4) = (  4.57596263318198E-01,  2.51075333697458E-01)
-
-X( 5) = (  4.57450206889025E-01, -1.14776387886289E-01)
-
-PATH NUMBER =      4754
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.77431649405854E-01, -1.98210183664209E-01)
-X( 2) = (  1.29124716080034E-01,  1.38160898263253E+00)
-X( 3) = ( -5.83386811827464E-01, -1.18530910619749E+00)
-X( 4) = (  4.95048469161809E-01,  3.30925694122200E-01)
-
-X( 5) = (  5.80220253217535E-01, -7.23707285193359E-02)
-
-PATH NUMBER =      4755
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.65472941813071E-01,  1.15346449227341E-01)
-X( 2) = ( -1.46588473872466E-01,  1.67742182656446E+00)
-X( 3) = ( -2.42511463704515E-01, -1.20002359515530E+00)
-X( 4) = (  4.72411701020826E-01,  4.16168432878323E-01)
-
-X( 5) = (  6.03593049217984E-01,  9.42421720957710E-02)
-
-PATH NUMBER =      4756
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.81572774451168E-02,  2.83579095419852E-01)
-X( 2) = ( -5.47941861795770E-01,  1.72680258953312E+00)
-X( 3) = (  2.80724937062643E-02, -9.92185097433748E-01)
-X( 4) = (  4.00277954288071E-01,  4.66917525134324E-01)
-
-X( 5) = (  4.78689788971015E-01,  1.70194271804502E-01)
-
-PATH NUMBER =      4757
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.50077151182317E-01,  2.27769830062248E-01)
-X( 2) = ( -8.87137736934517E-01,  1.50664546373943E+00)
-X( 3) = (  1.01755819526655E-01, -6.59043555984357E-01)
-X( 4) = (  3.12399410737096E-01,  4.59426906610284E-01)
-
-X( 5) = (  3.86179613003962E-01,  1.37563287980086E-01)
-
-PATH NUMBER =      4758
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.65645806995119E-01, -2.59675713337510E-02)
-X( 2) = ( -1.00546257956904E+00,  1.11996441511615E+00)
-X( 3) = ( -5.59387332936522E-02, -3.56479600507116E-01)
-X( 4) = (  2.49895417556624E-01,  3.97201520962553E-01)
-
-X( 5) = (  3.45230042495583E-01,  8.26002310207875E-02)
-
-PATH NUMBER =      4759
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.67681720159735E-01, -3.58906558677858E-01)
-X( 2) = ( -8.47550880796510E-01,  7.47691803795287E-01)
-X( 3) = ( -3.71224130910301E-01, -2.26066268393631E-01)
-X( 4) = (  2.42012287810305E-01,  3.09357317693834E-01)
-
-X( 5) = (  3.34007276876554E-01,  2.77002724973585E-02)
-
-PATH NUMBER =      4760
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.55232264279787E-01, -6.15261279587084E-01)
-X( 2) = ( -4.87291279465630E-01,  5.64018121963086E-01)
-X( 3) = ( -6.96574831771576E-01, -3.28825407122542E-01)
-X( 4) = (  2.92438625517669E-01,  2.36997575793132E-01)
-
-X( 5) = (  3.44120221472559E-01, -2.58275254244957E-02)
-
-PATH NUMBER =      4761
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.22950991257984E-02, -6.75080511082635E-01)
-X( 2) = ( -9.32532468786037E-02,  6.54886326654427E-01)
-X( 3) = ( -8.79755627074217E-01, -6.16674873641976E-01)
-X( 4) = (  3.77579386839124E-01,  2.13980222684739E-01)
-
-X( 5) = (  3.79688015043591E-01, -7.78221402326197E-02)
-
-PATH NUMBER =      4762
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.09159032988914E-01, -6.76183168057239E-01)
-X( 2) = (  6.94208366919637E-02,  8.71032446391924E-01)
-X( 3) = ( -1.03406757755537E+00, -1.07958700605838E+00)
-X( 4) = (  3.25533974668859E-01,  5.73941693036437E-01)
-
-X( 5) = (  3.77200323099466E-01, -2.36475956427547E-01)
-
-PATH NUMBER =      4763
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.24944005736399E-01, -3.64019181790409E-01)
-X( 2) = (  4.83571104998294E-02,  1.27486325401782E+00)
-X( 3) = ( -7.82400202514481E-01, -1.30996940877886E+00)
-X( 4) = (  3.62986180512469E-01,  6.53792053461179E-01)
-
-X( 5) = (  4.86528201310251E-01, -2.80130407389019E-01)
-
-PATH NUMBER =      4764
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.12985298143616E-01, -5.04625488988588E-02)
-X( 2) = ( -2.27356079452670E-01,  1.57067609794976E+00)
-X( 3) = ( -4.41524854391533E-01, -1.32468389773667E+00)
-X( 4) = (  3.40349412371486E-01,  7.39034792217303E-01)
-
-X( 5) = (  6.30109425927202E-01, -1.82760353280737E-01)
-
-PATH NUMBER =      4765
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.25669633775662E-01,  1.17770097293651E-01)
-X( 2) = ( -6.28709467375974E-01,  1.62005686091842E+00)
-X( 3) = ( -1.70940896980753E-01, -1.11684540001511E+00)
-X( 4) = (  2.68215665638731E-01,  7.89783884473303E-01)
-
-X( 5) = (  5.87772648705106E-01, -6.12396389116170E-03)
-
-PATH NUMBER =      4766
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.56479485177164E-03,  6.19608319360479E-02)
-X( 2) = ( -9.67905342514721E-01,  1.39989973512472E+00)
-X( 3) = ( -9.72575711603622E-02, -7.83703858565721E-01)
-X( 4) = (  1.80337122087756E-01,  7.82293265949263E-01)
-
-X( 5) = (  4.64300939688771E-01,  3.06223142199463E-02)
-
-PATH NUMBER =      4767
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.18133450664574E-01, -1.91776569459951E-01)
-X( 2) = ( -1.08623018514925E+00,  1.01321868650144E+00)
-X( 3) = ( -2.54952123980670E-01, -4.81139903088480E-01)
-X( 4) = (  1.17833128907284E-01,  7.20067880301532E-01)
-
-X( 5) = (  3.86620536316881E-01, -3.22704457368494E-03)
-
-PATH NUMBER =      4768
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.20169363829191E-01, -5.24715556804058E-01)
-X( 2) = ( -9.28318486376714E-01,  6.40946075180582E-01)
-X( 3) = ( -5.70237521597319E-01, -3.50726570974995E-01)
-X( 4) = (  1.09949999160965E-01,  6.32223677032813E-01)
-
-X( 5) = (  3.46527442256817E-01, -5.29009068246623E-02)
-
-PATH NUMBER =      4769
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.71990794924260E-03, -7.81070277713284E-01)
-X( 2) = ( -5.68058885045834E-01,  4.57272393348381E-01)
-X( 3) = ( -8.95588222458594E-01, -4.53485709703906E-01)
-X( 4) = (  1.60376336868330E-01,  5.59863935132111E-01)
-
-X( 5) = (  3.30215159708313E-01, -1.07888846789042E-01)
-
-PATH NUMBER =      4770
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.19807455456343E-01, -8.40889509208835E-01)
-X( 2) = ( -1.74020852458808E-01,  5.48140598039722E-01)
-X( 3) = ( -1.07876901776123E+00, -7.41335176223340E-01)
-X( 4) = (  2.45517098189784E-01,  5.36846582023718E-01)
-
-X( 5) = (  3.36046073974922E-01, -1.69170937570045E-01)
-
-PATH NUMBER =      4771
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.05344467729272E-01, -6.44102353797345E-01)
-X( 2) = (  7.61640929937176E-02,  7.37344058028938E-01)
-X( 3) = ( -1.10639058167834E+00, -1.30300567982368E+00)
-X( 4) = (  1.68338969357599E-02,  7.36383670627474E-01)
-
-X( 5) = (  3.05109015341073E-01, -3.64497666397148E-01)
-
-PATH NUMBER =      4772
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02112944047676E+00, -3.31938367530516E-01)
-X( 2) = (  5.51003668015837E-02,  1.14117486565484E+00)
-X( 3) = ( -8.54723206637461E-01, -1.53338808254417E+00)
-X( 4) = (  5.42861027793706E-02,  8.16234031052216E-01)
-
-X( 5) = (  3.67679266561760E-01, -4.85679140842250E-01)
-
-PATH NUMBER =      4773
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.09170732883974E-01, -1.83817346389651E-02)
-X( 2) = ( -2.20612823150916E-01,  1.43698770958677E+00)
-X( 3) = ( -5.13847858514513E-01, -1.54810257150197E+00)
-X( 4) = (  3.16493346383877E-02,  9.01476769808339E-01)
-
-X( 5) = (  5.90263995415637E-01, -5.47221982487762E-01)
-
-PATH NUMBER =      4774
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.21855068516020E-01,  1.49850911553545E-01)
-X( 2) = ( -6.21966211074220E-01,  1.48636847255543E+00)
-X( 3) = ( -2.43263901103733E-01, -1.34026407378042E+00)
-X( 4) = ( -4.04844120943676E-02,  9.52225862064340E-01)
-
-X( 5) = (  7.60300970120064E-01, -2.89847297450735E-01)
-
-PATH NUMBER =      4775
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.93620639888587E-01,  9.40416461959416E-02)
-X( 2) = ( -9.61162086212967E-01,  1.26621134676174E+00)
-X( 3) = ( -1.69580575283342E-01, -1.00712253233103E+00)
-X( 4) = ( -1.28362955645343E-01,  9.44735243540299E-01)
-
-X( 5) = (  6.09591949272693E-01, -1.06713264574351E-01)
-
-PATH NUMBER =      4776
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.80519840757841E-02, -1.59695755200058E-01)
-X( 2) = ( -1.07948692884749E+00,  8.79530298138460E-01)
-X( 3) = ( -3.27275128103649E-01, -7.04558576853786E-01)
-X( 4) = ( -1.90866948825815E-01,  8.82509857892568E-01)
-
-X( 5) = (  4.69599808669626E-01, -1.01989194244607E-01)
-
-PATH NUMBER =      4777
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.60160709111677E-02, -4.92634742544164E-01)
-X( 2) = ( -9.21575230074960E-01,  5.07257686817596E-01)
-X( 3) = ( -6.42560525720298E-01, -5.74145244740301E-01)
-X( 4) = ( -1.98750078572134E-01,  7.94665654623849E-01)
-
-X( 5) = (  3.86642705641902E-01, -1.45050530359342E-01)
-
-PATH NUMBER =      4778
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.88465526791116E-01, -7.48989463453390E-01)
-X( 2) = ( -5.61315628744080E-01,  3.23584004985395E-01)
-X( 3) = ( -9.67911226581574E-01, -6.76904383469212E-01)
-X( 4) = ( -1.48323740864769E-01,  7.22305912723148E-01)
-
-X( 5) = (  3.36214603178376E-01, -2.02342120974007E-01)
-
-PATH NUMBER =      4779
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.15992890196701E-01, -8.08808694948942E-01)
-X( 2) = ( -1.67277596157054E-01,  4.14452209676737E-01)
-X( 3) = ( -1.15109202188421E+00, -9.64753849988646E-01)
-X( 4) = ( -6.31829795433142E-02,  6.99288559614755E-01)
-
-X( 5) = (  3.07333964619865E-01, -2.72556407566570E-01)
-
-PATH NUMBER =      4780
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17472744663396E+00, -4.43362467863145E-01)
-X( 2) = ( -9.80311486868186E-02,  5.02029355775177E-01)
-X( 3) = ( -5.56145065061182E-01, -1.77701944508765E+00)
-X( 4) = ( -5.70025562119886E-01,  7.53218493447621E-01)
-
-X( 5) = ( -1.68844710555539E-03, -4.48398249294714E-01)
-
-PATH NUMBER =      4781
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.29051241938145E+00, -1.31198481596316E-01)
-X( 2) = ( -1.19094874878953E-01,  9.05860163401075E-01)
-X( 3) = ( -3.04477690020298E-01, -2.00740184780813E+00)
-X( 4) = ( -5.32573356276275E-01,  8.33068853872363E-01)
-
-X( 5) = ( -9.57008944272377E-02, -5.00982242968638E-01)
-
-PATH NUMBER =      4782
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17855371178866E+00,  1.82358151295235E-01)
-X( 2) = ( -3.94808064831452E-01,  1.20167300733301E+00)
-X( 3) = (  3.63976581026498E-02, -2.02211633676594E+00)
-X( 4) = ( -5.55210124417258E-01,  9.18311592628487E-01)
-
-X( 5) = ( -1.91572162217489E-01, -6.25506099206377E-01)
-
-PATH NUMBER =      4783
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.91238047420709E-01,  3.50590797487745E-01)
-X( 2) = ( -7.96161452754756E-01,  1.25105377030167E+00)
-X( 3) = (  3.06981615513429E-01, -1.81427783904438E+00)
-X( 4) = ( -6.27343871150013E-01,  9.69060684884487E-01)
-
-X( 5) = ( -1.81861270823641E-01, -9.11828509650753E-01)
-
-PATH NUMBER =      4784
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.63003618793276E-01,  2.94781532130141E-01)
-X( 2) = ( -1.13535732789350E+00,  1.03089664450797E+00)
-X( 3) = (  3.80664941333820E-01, -1.48113629759499E+00)
-X( 4) = ( -7.15222414700988E-01,  9.61570066360447E-01)
-
-X( 5) = (  2.72010617022800E-01, -1.04584509883381E+00)
-
-PATH NUMBER =      4785
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.47434962980473E-01,  4.10441307341421E-02)
-X( 2) = ( -1.25368217052803E+00,  6.44215595884699E-01)
-X( 3) = (  2.22970388513513E-01, -1.17857234211775E+00)
-X( 4) = ( -7.77726407881460E-01,  8.99344680712716E-01)
-
-X( 5) = (  4.28177698275944E-01, -6.71694165130723E-01)
-
-PATH NUMBER =      4786
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.45399049815857E-01, -2.91894856609965E-01)
-X( 2) = ( -1.09577047175550E+00,  2.71942984563836E-01)
-X( 3) = ( -9.23150091031361E-02, -1.04815901000427E+00)
-X( 4) = ( -7.85609537627779E-01,  8.11500477443997E-01)
-
-X( 5) = (  3.04972750741739E-01, -4.92612480995675E-01)
-
-PATH NUMBER =      4787
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.57848505695805E-01, -5.48249577519191E-01)
-X( 2) = ( -7.35510870424616E-01,  8.82693027316346E-02)
-X( 3) = ( -4.17665709964411E-01, -1.15091814873318E+00)
-X( 4) = ( -7.35183199920414E-01,  7.39140735543295E-01)
-
-X( 5) = (  1.87055894300430E-01, -4.37973465775127E-01)
-
-PATH NUMBER =      4788
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.85375869101391E-01, -6.08068809014742E-01)
-X( 2) = ( -3.41472837837590E-01,  1.79137507422976E-01)
-X( 3) = ( -6.00846505267052E-01, -1.43876761525261E+00)
-X( 4) = ( -6.50042438598960E-01,  7.16123382434903E-01)
-
-X( 5) = (  8.90185772107276E-02, -4.29543449872353E-01)
-
-PATH NUMBER =      4789
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19456607302202E+00, -1.46105980467247E-01)
-X( 2) = (  3.47971668290974E-02,  4.85455421847232E-01)
-X( 3) = ( -3.48679380838757E-01, -1.88703994582520E+00)
-X( 4) = ( -7.83604887010166E-01,  4.77416016925890E-01)
-
-X( 5) = ( -1.54124524120804E-01, -5.23203893322548E-01)
-
-PATH NUMBER =      4790
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.31035104576951E+00,  1.66058005799582E-01)
-X( 2) = (  1.37334406369638E-02,  8.89286229473130E-01)
-X( 3) = ( -9.70120057978740E-02, -2.11742234854568E+00)
-X( 4) = ( -7.46152681166556E-01,  5.57266377350632E-01)
-
-X( 5) = ( -3.04149202423117E-01, -5.04064403319080E-01)
-
-PATH NUMBER =      4791
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19839233817673E+00,  4.79614638691133E-01)
-X( 2) = ( -2.61979749315537E-01,  1.18509907340506E+00)
-X( 3) = (  2.43863342325076E-01, -2.13213683750349E+00)
-X( 4) = ( -7.68789449307539E-01,  6.42509116106755E-01)
-
-X( 5) = ( -5.04678322836539E-01, -5.21996172606515E-01)
-
-PATH NUMBER =      4792
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.11076673808772E-01,  6.47847284883643E-01)
-X( 2) = ( -6.63333137238840E-01,  1.23447983637373E+00)
-X( 3) = (  5.14447299735855E-01, -1.92429833978194E+00)
-X( 4) = ( -8.40923196040294E-01,  6.93258208362756E-01)
-
-X( 5) = ( -8.38526781049515E-01, -6.79287169611880E-01)
-
-PATH NUMBER =      4793
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.82842245181339E-01,  5.92038019526039E-01)
-X( 2) = ( -1.00252901237759E+00,  1.01432271058003E+00)
-X( 3) = (  5.88130625556246E-01, -1.59115679833255E+00)
-X( 4) = ( -9.28801739591269E-01,  6.85767589838716E-01)
-
-X( 5) = ( -1.07899309733348E+00, -1.65367831439943E+00)
-
-PATH NUMBER =      4794
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.67273589368536E-01,  3.38300618130040E-01)
-X( 2) = ( -1.12085385501211E+00,  6.27641661956753E-01)
-X( 3) = (  4.30436072735938E-01, -1.28859284285530E+00)
-X( 4) = ( -9.91305732771741E-01,  6.23542204190985E-01)
-
-X( 5) = (  4.43893640400794E-01, -1.57825471338247E+00)
-
-PATH NUMBER =      4795
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.65237676203920E-01,  5.36163078593328E-03)
-X( 2) = ( -9.62942156239581E-01,  2.55369050635890E-01)
-X( 3) = (  1.15150675119289E-01, -1.15817951074182E+00)
-X( 4) = ( -9.99188862518060E-01,  5.35698000922266E-01)
-
-X( 5) = (  3.46450926791199E-01, -8.65201077633382E-01)
-
-PATH NUMBER =      4796
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.77687132083868E-01, -2.50993090123293E-01)
-X( 2) = ( -6.02682554908700E-01,  7.16953688036889E-02)
-X( 3) = ( -2.10200025741986E-01, -1.26093864947073E+00)
-X( 4) = ( -9.48762524810695E-01,  4.63338259021564E-01)
-
-X( 5) = (  1.41303089181309E-01, -6.54633604353123E-01)
-
-PATH NUMBER =      4797
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.05214495489454E-01, -3.10812321618844E-01)
-X( 2) = ( -2.08644522321674E-01,  1.62563573495030E-01)
-X( 3) = ( -3.93380821044627E-01, -1.54878811599016E+00)
-X( 4) = ( -8.63621763489241E-01,  4.40320905913172E-01)
-
-X( 5) = ( -1.51738795851628E-02, -5.67536089656947E-01)
-
-PATH NUMBER =      4798
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01869055552869E+00,  9.43577231188939E-02)
-X( 2) = (  1.47203079191566E-01,  5.58139447290273E-01)
-X( 3) = ( -1.19031631616684E-01, -1.83796416779106E+00)
-X( 4) = ( -7.69933727378437E-01,  1.28852918663277E-01)
-
-X( 5) = ( -4.00615275407781E-01, -7.07933275493098E-01)
-
-PATH NUMBER =      4799
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13447552827617E+00,  4.06521709385723E-01)
-X( 2) = (  1.26139352999432E-01,  9.61970254916171E-01)
-X( 3) = (  1.32635743424199E-01, -2.06834657051154E+00)
-X( 4) = ( -7.32481521534827E-01,  2.08703279088019E-01)
-
-X( 5) = ( -6.35972533510110E-01, -5.04590826731194E-01)
-
-PATH NUMBER =      4800
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02251682068339E+00,  7.20078342277274E-01)
-X( 2) = ( -1.49573836953068E-01,  1.25778309884810E+00)
-X( 3) = (  4.73511091547148E-01, -2.08306105946934E+00)
-X( 4) = ( -7.55118289675809E-01,  2.93946017844142E-01)
-
-X( 5) = ( -8.83647556810658E-01, -2.54941001462489E-01)
-
-PATH NUMBER =      4801
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.35201156315435E-01,  8.88310988469784E-01)
-X( 2) = ( -5.50927224876372E-01,  1.30716386181677E+00)
-X( 3) = (  7.44095048957927E-01, -1.87522256174779E+00)
-X( 4) = ( -8.27252036408565E-01,  3.44695110100144E-01)
-
-X( 5) = ( -1.21771767603968E+00,  1.59041651464887E-01)
-
-PATH NUMBER =      4802
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.06966727688002E-01,  8.32501723112180E-01)
-X( 2) = ( -8.90123100015119E-01,  1.08700673602307E+00)
-X( 3) = (  8.17778374778318E-01, -1.54208102029840E+00)
-X( 4) = ( -9.15130579959540E-01,  3.37204491576103E-01)
-
-X( 5) = ( -1.79716698138586E+00,  1.30596664192320E+00)
-
-PATH NUMBER =      4803
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.91398071875199E-01,  5.78764321716181E-01)
-X( 2) = ( -1.00844794264965E+00,  7.00325687399794E-01)
-X( 3) = (  6.60083821958011E-01, -1.23951706482116E+00)
-X( 4) = ( -9.77634573140012E-01,  2.74979105928372E-01)
-
-X( 5) = (  4.75060744437455E+00,  6.20768825180735E+00)
-
-PATH NUMBER =      4804
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.89362158710583E-01,  2.45825334372074E-01)
-X( 2) = ( -8.50536243877112E-01,  3.28053076078931E-01)
-X( 3) = (  3.44798424341361E-01, -1.10910373270767E+00)
-X( 4) = ( -9.85517702886331E-01,  1.87134902659653E-01)
-
-X( 5) = (  1.62677508635348E+00, -1.60517795029708E+00)
-
-PATH NUMBER =      4805
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.01811614590531E-01, -1.05293865371515E-02)
-X( 2) = ( -4.90276642546232E-01,  1.44379394246730E-01)
-X( 3) = (  1.94477234800863E-02, -1.21186287143659E+00)
-X( 4) = ( -9.35091365178966E-01,  1.14775160758952E-01)
-
-X( 5) = (  3.52415402040911E-01, -1.19325042846452E+00)
-
-PATH NUMBER =      4806
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.29338977996117E-01, -7.03486180327027E-02)
-X( 2) = ( -9.62386099592059E-02,  2.35247598938071E-01)
-X( 3) = ( -1.63733071822554E-01, -1.49971233795602E+00)
-X( 4) = ( -8.49950603857512E-01,  9.17578076505587E-02)
-
-X( 5) = ( -1.15205650166780E-01, -9.18395135136000E-01)
-
-PATH NUMBER =      4807
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.29395003427734E-01,  1.65513003530942E-01)
-X( 2) = (  1.86590612753626E-01,  6.86071768806538E-01)
-X( 3) = (  2.53434484935893E-02, -1.65275521294391E+00)
-X( 4) = ( -5.35408970754400E-01, -1.29374253815809E-01)
-
-X( 5) = ( -7.94547060647136E-01, -1.68162269597345E+00)
-
-PATH NUMBER =      4808
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.45179976175219E-01,  4.77676989797771E-01)
-X( 2) = (  1.65526886561492E-01,  1.08990257643244E+00)
-X( 3) = (  2.77010823534473E-01, -1.88313761566439E+00)
-X( 4) = ( -4.97956764910789E-01, -4.95238933910675E-02)
-
-X( 5) = ( -1.54971446992466E+00, -4.78220205890148E-01)
-
-PATH NUMBER =      4809
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.33221268582436E-01,  7.91233622689321E-01)
-X( 2) = ( -1.10186303391007E-01,  1.38571542036437E+00)
-X( 3) = (  6.17886171657421E-01, -1.89785210462220E+00)
-X( 4) = ( -5.20593533051772E-01,  3.57188453650560E-02)
-
-X( 5) = ( -1.26880227207473E+00,  5.35611673577038E-01)
-
-PATH NUMBER =      4810
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.45905604214482E-01,  9.59466268881832E-01)
-X( 2) = ( -5.11539691314312E-01,  1.43509618333303E+00)
-X( 3) = (  8.88470129068200E-01, -1.69001360690064E+00)
-X( 4) = ( -5.92727279784527E-01,  8.64679376210567E-02)
-
-X( 5) = ( -6.52648127782927E-01,  1.04211191913088E+00)
-
-PATH NUMBER =      4811
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17671175587048E-01,  9.03657003524228E-01)
-X( 2) = ( -8.50735566453059E-01,  1.21493905753933E+00)
-X( 3) = (  9.62153454888592E-01, -1.35687206545125E+00)
-X( 4) = ( -6.80605823335502E-01,  7.89773190970163E-02)
-
-X( 5) = (  1.61587529567241E-02,  1.17845396320395E+00)
-
-PATH NUMBER =      4812
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.78974802257543E-02,  6.49919602128229E-01)
-X( 2) = ( -9.69060409087586E-01,  8.28258008916060E-01)
-X( 3) = (  8.04458902068284E-01, -1.05430810997401E+00)
-X( 4) = ( -7.43109816515974E-01,  1.67519334492856E-02)
-
-X( 5) = (  6.71446936902209E-01,  1.01473088732191E+00)
-
-PATH NUMBER =      4813
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.99333933903706E-02,  3.16980614784122E-01)
-X( 2) = ( -8.11148710315053E-01,  4.55985397595196E-01)
-X( 3) = (  4.89173504451635E-01, -9.23894777860527E-01)
-X( 4) = ( -7.50992946262293E-01, -7.10922698194338E-02)
-
-X( 5) = (  1.25241544139365E+00,  5.03829177538034E-01)
-
-PATH NUMBER =      4814
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12516062489578E-01,  6.06258938748960E-02)
-X( 2) = ( -4.50889108984172E-01,  2.72311715762995E-01)
-X( 3) = (  1.63822803590360E-01, -1.02665391658944E+00)
-X( 4) = ( -7.00566608554929E-01, -1.43452011720135E-01)
-
-X( 5) = (  1.51197281492240E+00, -4.68597105204154E-01)
-
-PATH NUMBER =      4815
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.40043425895163E-01,  8.06662379344818E-04)
-X( 2) = ( -5.68510763971458E-02,  3.63179920454337E-01)
-X( 3) = ( -1.93579917122808E-02, -1.31450338310887E+00)
-X( 4) = ( -6.15425847233474E-01, -1.66469364828528E-01)
-
-X( 5) = (  8.13675329939596E-01, -1.64619445587166E+00)
-
-PATH NUMBER =      4816
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.62044020709126E-01,  3.40655142612435E-02)
-X( 2) = (  1.34529902817914E-01,  8.09391431349189E-01)
-X( 3) = (  1.68911549581813E-02, -1.41807440962499E+00)
-X( 4) = ( -1.89767357214779E-01, -1.76438136633057E-01)
-
-X( 5) = (  1.62625146254962E+00, -1.05234006322631E+00)
-
-PATH NUMBER =      4817
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.77828993456611E-01,  3.46229500528073E-01)
-X( 2) = (  1.13466176625780E-01,  1.21322223897509E+00)
-X( 3) = (  2.68558529999065E-01, -1.64845681234547E+00)
-X( 4) = ( -1.52315151371169E-01, -9.65877762083153E-02)
-
-X( 5) = (  1.22489923871620E+01,  3.95244284818874E+00)
-
-PATH NUMBER =      4818
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.65870285863828E-01,  6.59786133419624E-01)
-X( 2) = ( -1.62247013326720E-01,  1.50903508290702E+00)
-X( 3) = (  6.09433878122014E-01, -1.66317130130328E+00)
-X( 4) = ( -1.74951919512152E-01, -1.13450374521916E-02)
-
-X( 5) = ( -2.44396720741151E-02,  2.04865476380008E+00)
-
-PATH NUMBER =      4819
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.78554621495874E-01,  8.28018779612134E-01)
-X( 2) = ( -5.63600401250024E-01,  1.55841584587568E+00)
-X( 3) = (  8.80017835532793E-01, -1.45533280358173E+00)
-X( 4) = ( -2.47085666244907E-01,  3.94040548038090E-02)
-
-X( 5) = (  2.70880439815968E-01,  1.04735752757885E+00)
-
-PATH NUMBER =      4820
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.49679807131560E-01,  7.72209514254530E-01)
-X( 2) = ( -9.02796276388771E-01,  1.33825872008199E+00)
-X( 3) = (  9.53701161353184E-01, -1.12219126213234E+00)
-X( 4) = ( -3.34964209795882E-01,  3.19134362797685E-02)
-
-X( 5) = (  4.30772304518567E-01,  6.72943656449124E-01)
-
-PATH NUMBER =      4821
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.65248462944362E-01,  5.18472112858531E-01)
-X( 2) = ( -1.02112111902330E+00,  9.51577671458711E-01)
-X( 3) = (  7.96006608532877E-01, -8.19627306655095E-01)
-X( 4) = ( -3.97468202976354E-01, -3.03119493679622E-02)
-
-X( 5) = (  5.47139452926005E-01,  4.36608331827670E-01)
-
-PATH NUMBER =      4822
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.67284376108978E-01,  1.85533125514424E-01)
-X( 2) = ( -8.63209420250764E-01,  5.79305060137847E-01)
-X( 3) = (  4.80721210916228E-01, -6.89213974541610E-01)
-X( 4) = ( -4.05351332722673E-01, -1.18156152636681E-01)
-
-X( 5) = (  6.56814824688771E-01,  2.34512030829696E-01)
-
-PATH NUMBER =      4823
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.54834920229030E-01, -7.08215953948017E-02)
-X( 2) = ( -5.02949818919884E-01,  3.95631378305646E-01)
-X( 3) = (  1.55370510054952E-01, -7.91973113270521E-01)
-X( 4) = ( -3.54924995015308E-01, -1.90515894537383E-01)
-
-X( 5) = (  7.89379532706317E-01,  1.16259815462394E-02)
-
-PATH NUMBER =      4824
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.72692443176556E-01, -1.30640826890353E-01)
-X( 2) = ( -1.08911786332858E-01,  4.86499582996988E-01)
-X( 3) = ( -2.78102852476883E-02, -1.07982257978995E+00)
-X( 4) = ( -2.69784233693854E-01, -2.13533247645776E-01)
-
-X( 5) = (  1.00738193370822E+00, -3.14685381361421E-01)
-
-PATH NUMBER =      4825
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.41734103462105E-01, -2.38479003584792E-01)
-X( 2) = (  1.53807341536916E-02,  8.70395794269134E-01)
-X( 3) = ( -1.40433590140912E-01, -1.24373151389383E+00)
-X( 4) = (  1.05261560886591E-01,  9.68298403851908E-03)
-
-X( 5) = (  7.38279840725866E-01, -3.77636460536781E-01)
-
-PATH NUMBER =      4826
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.57519076209590E-01,  7.36849826820371E-02)
-X( 2) = ( -5.68299203844250E-03,  1.27422660189503E+00)
-X( 3) = (  1.11233784899972E-01, -1.47411391661431E+00)
-X( 4) = (  1.42713766730201E-01,  8.95333444632609E-02)
-
-X( 5) = (  1.25304059515893E+00, -4.29597555721113E-01)
-
-PATH NUMBER =      4827
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.45560368616806E-01,  3.87241615573588E-01)
-X( 2) = ( -2.81396181990942E-01,  1.57003944582696E+00)
-X( 3) = (  4.52109133022921E-01, -1.48882840557212E+00)
-X( 4) = (  1.20076998589219E-01,  1.74776083219385E-01)
-
-X( 5) = (  1.40802488702967E+00,  4.86905456463802E-01)
-
-PATH NUMBER =      4828
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.82447042488525E-02,  5.55474261766098E-01)
-X( 2) = ( -6.82749569914246E-01,  1.61942020879563E+00)
-X( 3) = (  7.22693090433700E-01, -1.28098990785057E+00)
-X( 4) = (  4.79432518564635E-02,  2.25525175475385E-01)
-
-X( 5) = (  7.56684654256993E-01,  5.43644877809456E-01)
-
-PATH NUMBER =      4829
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.69989724378581E-01,  4.99664996408494E-01)
-X( 2) = ( -1.02194544505299E+00,  1.39926308300193E+00)
-X( 3) = (  7.96376416254091E-01, -9.47848366401175E-01)
-X( 4) = ( -3.99352916945119E-02,  2.18034556951345E-01)
-
-X( 5) = (  5.60528219417643E-01,  3.34796149687729E-01)
-
-PATH NUMBER =      4830
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.85558380191383E-01,  2.45927595012496E-01)
-X( 2) = ( -1.14027028768752E+00,  1.01258203437865E+00)
-X( 3) = (  6.38681863433784E-01, -6.45284410923935E-01)
-X( 4) = ( -1.02439284874984E-01,  1.55809171303614E-01)
-
-X( 5) = (  5.05741207288710E-01,  1.79163353090926E-01)
-
-PATH NUMBER =      4831
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.87594293356000E-01, -8.70113923316109E-02)
-X( 2) = ( -9.82358588914986E-01,  6.40309423057792E-01)
-X( 3) = (  3.23396465817135E-01, -5.14871078810450E-01)
-X( 4) = ( -1.10322414621303E-01,  6.79649680348949E-02)
-
-X( 5) = (  4.96666909333879E-01,  5.32578837396752E-02)
-
-PATH NUMBER =      4832
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.75144837476052E-01, -3.43366113240837E-01)
-X( 2) = ( -6.22098987584106E-01,  4.56635741225591E-01)
-X( 3) = ( -1.95423504414061E-03, -6.17630217539361E-01)
-X( 4) = ( -5.98960769139382E-02, -4.39477386580670E-03)
-
-X( 5) = (  5.15594046258443E-01, -6.76121246493865E-02)
-
-PATH NUMBER =      4833
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.23825259295340E-02, -4.03185344736388E-01)
-X( 2) = ( -2.28060954997080E-01,  5.47503945916932E-01)
-X( 3) = ( -1.85135030346781E-01, -9.05479684058794E-01)
-X( 4) = (  2.52446844075165E-02, -2.74121269741995E-02)
-
-X( 5) = (  5.74281841068403E-01, -2.04940900811410E-01)
-
-PATH NUMBER =      4834
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.24759599062343E-01, -5.24593941112086E-01)
-X( 2) = ( -1.15105673025543E-01,  8.40540238168157E-01)
-X( 3) = ( -3.73016790102043E-01, -1.21130350426850E+00)
-X( 4) = (  2.11630473888887E-01,  3.41900967330842E-01)
-
-X( 5) = (  4.22066490980345E-01, -3.53867104911101E-01)
-
-PATH NUMBER =      4835
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.40544571809828E-01, -2.12429954845256E-01)
-X( 2) = ( -1.36169399217677E-01,  1.24437104579405E+00)
-X( 3) = ( -1.21349415061159E-01, -1.44168590698898E+00)
-X( 4) = (  2.49082679732497E-01,  4.21751327755583E-01)
-
-X( 5) = (  5.70706383112160E-01, -4.76868808256514E-01)
-
-PATH NUMBER =      4836
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.28585864217045E-01,  1.01126678046295E-01)
-X( 2) = ( -4.11882589170176E-01,  1.54018388972599E+00)
-X( 3) = (  2.19525933061789E-01, -1.45640039594678E+00)
-X( 4) = (  2.26445911591515E-01,  5.06994066511707E-01)
-
-X( 5) = (  8.94133020758586E-01, -3.73752621133221E-01)
-
-PATH NUMBER =      4837
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.41270199849090E-01,  2.69359324238805E-01)
-X( 2) = ( -8.13235977093481E-01,  1.58956465269465E+00)
-X( 3) = (  4.90109890472569E-01, -1.24856189822523E+00)
-X( 4) = (  1.54312164858759E-01,  5.57743158767707E-01)
-
-X( 5) = (  8.40763010668724E-01,  6.29403293210369E-03)
-
-PATH NUMBER =      4838
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.86964228778343E-01,  2.13550058881201E-01)
-X( 2) = ( -1.15243185223223E+00,  1.36940752690095E+00)
-X( 3) = (  5.63793216292960E-01, -9.15420356775839E-01)
-X( 4) = (  6.64336213077844E-02,  5.50252540243667E-01)
-
-X( 5) = (  6.06088752493405E-01,  6.23905596680637E-02)
-
-PATH NUMBER =      4839
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.02532884591145E-01, -4.01873425147981E-02)
-X( 2) = ( -1.27075669486675E+00,  9.82726478277679E-01)
-X( 3) = (  4.06098663472652E-01, -6.12856401298598E-01)
-X( 4) = (  3.92962812731236E-03,  4.88027154595936E-01)
-
-X( 5) = (  4.82038461930007E-01,  1.17110934663915E-03)
-
-PATH NUMBER =      4840
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.04568797755761E-01, -3.73126329858905E-01)
-X( 2) = ( -1.11284499609422E+00,  6.10453866956815E-01)
-X( 3) = (  9.08132658560031E-02, -4.82443069185113E-01)
-X( 4) = ( -3.95350161900680E-03,  4.00182951327217E-01)
-
-X( 5) = (  4.20362776436575E-01, -7.35528972525066E-02)
-
-PATH NUMBER =      4841
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.92119341875814E-01, -6.29481050768131E-01)
-X( 2) = ( -7.52585394763340E-01,  4.26780185124614E-01)
-X( 3) = ( -2.34537435005272E-01, -5.85202207914024E-01)
-X( 4) = (  4.64728360883579E-02,  3.27823209426516E-01)
-
-X( 5) = (  3.90224513463731E-01, -1.52159910158985E-01)
-
-PATH NUMBER =      4842
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.35408021529772E-01, -6.89300282263682E-01)
-X( 2) = ( -3.58547362176314E-01,  5.17648389815955E-01)
-X( 3) = ( -4.17718230307913E-01, -8.73051674433458E-01)
-X( 4) = (  1.31613597409812E-01,  3.04805856318123E-01)
-
-X( 5) = (  3.85279171291085E-01, -2.41752761386395E-01)
-
-PATH NUMBER =      4843
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.72271955392888E-01, -6.90402939238286E-01)
-X( 2) = ( -1.95873278605747E-01,  7.33794509553452E-01)
-X( 3) = ( -5.72030180789061E-01, -1.33596380684986E+00)
-X( 4) = (  7.95681852395475E-02,  6.64767326669821E-01)
-
-X( 5) = (  2.51028656337690E-01, -3.73869088241878E-01)
-
-PATH NUMBER =      4844
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.88056928140373E-01, -3.78238952971457E-01)
-X( 2) = ( -2.16937004797881E-01,  1.13762531717935E+00)
-X( 3) = ( -3.20362805748177E-01, -1.56634620957034E+00)
-X( 4) = (  1.17020391083158E-01,  7.44617687094562E-01)
-
-X( 5) = (  2.79656904672944E-01, -4.90074584019530E-01)
-
-PATH NUMBER =      4845
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.76098220547590E-01, -6.46823200799062E-02)
-X( 2) = ( -4.92650194750380E-01,  1.43343816111128E+00)
-X( 3) = (  2.05125423747713E-02, -1.58106069852815E+00)
-X( 4) = (  9.43836229421751E-02,  8.29860425850686E-01)
-
-X( 5) = (  4.45264807210559E-01, -5.99408043668595E-01)
-
-PATH NUMBER =      4846
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.88782556179636E-01,  1.03550326112604E-01)
-X( 2) = ( -8.94003582673684E-01,  1.48281892407995E+00)
-X( 3) = (  2.91096499785551E-01, -1.37322220080659E+00)
-X( 4) = (  2.22498762094199E-02,  8.80609518106687E-01)
-
-X( 5) = (  6.81700743740318E-01, -4.39736805443649E-01)
-
-PATH NUMBER =      4847
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.05481275522022E-02,  4.77410607550005E-02)
-X( 2) = ( -1.23319945781243E+00,  1.26266179828625E+00)
-X( 3) = (  3.64779825605942E-01, -1.04008065935720E+00)
-X( 4) = ( -6.56286673415556E-02,  8.73118899582646E-01)
-
-X( 5) = (  6.04461131529741E-01, -2.08020860651184E-01)
-
-PATH NUMBER =      4848
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.55020528260600E-01, -2.05996340640999E-01)
-X( 2) = ( -1.35152430044696E+00,  8.75980749662973E-01)
-X( 3) = (  2.07085272785635E-01, -7.37516703879962E-01)
-X( 4) = ( -1.28132660522028E-01,  8.10893513934915E-01)
-
-X( 5) = (  4.63781641021275E-01, -1.62250381916365E-01)
-
-PATH NUMBER =      4849
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.57056441425217E-01, -5.38935327985105E-01)
-X( 2) = ( -1.19361260167443E+00,  5.03708138342110E-01)
-X( 3) = ( -1.08200124831014E-01, -6.07103371766478E-01)
-X( 4) = ( -1.36015790268347E-01,  7.23049310666196E-01)
-
-X( 5) = (  3.70770250318672E-01, -1.86004517439277E-01)
-
-PATH NUMBER =      4850
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.53930144547314E-02, -7.95290048894331E-01)
-X( 2) = ( -8.33353000343545E-01,  3.20034456509909E-01)
-X( 3) = ( -4.33550825692290E-01, -7.09862510495389E-01)
-X( 4) = ( -8.55894525609818E-02,  6.50689568765495E-01)
-
-X( 5) = (  3.10289045916579E-01, -2.31405069731031E-01)
-
-PATH NUMBER =      4851
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.82920377860317E-01, -8.55109280389882E-01)
-X( 2) = ( -4.39314967756518E-01,  4.10902661201250E-01)
-X( 3) = ( -6.16731620994930E-01, -9.97711977014822E-01)
-X( 4) = ( -4.48691239527351E-04,  6.27672215657102E-01)
-
-X( 5) = (  2.70105767455694E-01, -2.91729062769096E-01)
-
-PATH NUMBER =      4852
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.68457390133246E-01, -6.58322124978392E-01)
-X( 2) = ( -1.89130022303993E-01,  6.00106121190467E-01)
-X( 3) = ( -6.44353184912040E-01, -1.55938248061517E+00)
-X( 4) = ( -2.29131892493552E-01,  8.27209304260857E-01)
-
-X( 5) = (  1.22476676621677E-01, -4.04696053163869E-01)
-
-PATH NUMBER =      4853
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08424236288073E+00, -3.46158138711563E-01)
-X( 2) = ( -2.10193748496127E-01,  1.00393692881636E+00)
-X( 3) = ( -3.92685809871157E-01, -1.78976488333565E+00)
-X( 4) = ( -1.91679686649941E-01,  9.07059664685599E-01)
-
-X( 5) = (  8.25319970669890E-02, -4.96662275087791E-01)
-
-PATH NUMBER =      4854
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.72283655287948E-01, -3.26015058200124E-02)
-X( 2) = ( -4.85906938448626E-01,  1.29974977274830E+00)
-X( 3) = ( -5.18104617482084E-02, -1.80447937229345E+00)
-X( 4) = ( -2.14316454790923E-01,  9.92302403441722E-01)
-
-X( 5) = (  1.07073145768732E-01, -6.51229287640907E-01)
-
-PATH NUMBER =      4855
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.84967990919994E-01,  1.35631140372498E-01)
-X( 2) = ( -8.87260326371931E-01,  1.34913053571696E+00)
-X( 3) = (  2.18773495662571E-01, -1.59664087457190E+00)
-X( 4) = ( -2.86450201523679E-01,  1.04305149569772E+00)
-
-X( 5) = (  3.40759377538813E-01, -7.67617553157890E-01)
-
-PATH NUMBER =      4856
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.56733562292560E-01,  7.98218750148943E-02)
-X( 2) = ( -1.22645620151068E+00,  1.12897340992326E+00)
-X( 3) = (  2.92456821482962E-01, -1.26349933312251E+00)
-X( 4) = ( -3.74328745074654E-01,  1.03556087717368E+00)
-
-X( 5) = (  5.38144160976333E-01, -5.39722337555984E-01)
-
-PATH NUMBER =      4857
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.41164906479758E-01, -1.73915526381105E-01)
-X( 2) = ( -1.34478104414520E+00,  7.42292361299988E-01)
-X( 3) = (  1.34762268662655E-01, -9.60935377645268E-01)
-X( 4) = ( -4.36832738255126E-01,  9.73335491525952E-01)
-
-X( 5) = (  4.46427316354180E-01, -3.56328729748678E-01)
-
-PATH NUMBER =      4858
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.39128993315142E-01, -5.06854513725212E-01)
-X( 2) = ( -1.18686934537267E+00,  3.70019749979125E-01)
-X( 3) = ( -1.80523128953994E-01, -8.30522045531783E-01)
-X( 4) = ( -4.44715868001445E-01,  8.85491288257232E-01)
-
-X( 5) = (  3.32394004603800E-01, -3.11449282948082E-01)
-
-PATH NUMBER =      4859
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.51578449195089E-01, -7.63209234634438E-01)
-X( 2) = ( -8.26609744041791E-01,  1.86346068146924E-01)
-X( 3) = ( -5.05873829815270E-01, -9.33281184260694E-01)
-X( 4) = ( -3.94289530294080E-01,  8.13131546356531E-01)
-
-X( 5) = (  2.46286587239950E-01, -3.18695099488484E-01)
-
-PATH NUMBER =      4860
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.79105812600675E-01, -8.23028466129989E-01)
-X( 2) = ( -4.32571711454765E-01,  2.77214272838265E-01)
-X( 3) = ( -6.89054625117910E-01, -1.22113065078013E+00)
-X( 4) = ( -3.09148768972626E-01,  7.90114193248138E-01)
-
-X( 5) = (  1.78682132414393E-01, -3.50190060362008E-01)
-
-PATH NUMBER =      4861
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23221504285828E+00, -4.13687240026428E-01)
-X( 2) = ( -2.13043386124081E-01,  2.26371226638833E-01)
-X( 3) = ( -3.74080537953585E-02, -1.67642355482538E+00)
-X( 4) = ( -8.16827880251049E-01,  6.64691203533304E-01)
-
-X( 5) = ( -1.51723717195812E-01, -3.72898051443791E-01)
-
-PATH NUMBER =      4862
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.34800001560576E+00, -1.01523253759599E-01)
-X( 2) = ( -2.34107112316215E-01,  6.30202034264730E-01)
-X( 3) = (  2.14259321245526E-01, -1.90680595754586E+00)
-X( 4) = ( -7.79375674407439E-01,  7.44541563958046E-01)
-
-X( 5) = ( -2.28724528539476E-01, -3.52449987032505E-01)
-
-PATH NUMBER =      4863
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23604130801298E+00,  2.12033379131953E-01)
-X( 2) = ( -5.09820302268715E-01,  9.26014878196665E-01)
-X( 3) = (  5.55134669368474E-01, -1.92152044650367E+00)
-X( 4) = ( -8.02012442548421E-01,  8.29784302714170E-01)
-
-X( 5) = ( -3.24416400742452E-01, -3.61422799111671E-01)
-
-PATH NUMBER =      4864
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.48725643645027E-01,  3.80266025324462E-01)
-X( 2) = ( -9.11173690192018E-01,  9.75395641165326E-01)
-X( 3) = (  8.25718626779252E-01, -1.71368194878212E+00)
-X( 4) = ( -8.74146189281176E-01,  8.80533394970170E-01)
-
-X( 5) = ( -4.44252763853133E-01, -4.39296744850221E-01)
-
-PATH NUMBER =      4865
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.20491215017594E-01,  3.24456759966859E-01)
-X( 2) = ( -1.25036956533077E+00,  7.55238515371630E-01)
-X( 3) = (  8.99401952599644E-01, -1.38054040733273E+00)
-X( 4) = ( -9.62024732832152E-01,  8.73042776446130E-01)
-
-X( 5) = ( -4.90543806080624E-01, -6.82181007011348E-01)
-
-PATH NUMBER =      4866
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.04922559204791E-01,  7.07193585708594E-02)
-X( 2) = ( -1.36869440796529E+00,  3.68557466748354E-01)
-X( 3) = (  7.41707399779337E-01, -1.07797645185548E+00)
-X( 4) = ( -1.02452872601262E+00,  8.10817390798400E-01)
-
-X( 5) = ( -1.88860054039906E-01, -8.43221733270714E-01)
-
-PATH NUMBER =      4867
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.02886646040175E-01, -2.62219628773247E-01)
-X( 2) = ( -1.21078270919276E+00, -3.71514457250913E-03)
-X( 3) = (  4.26422002162688E-01, -9.47563119741999E-01)
-X( 4) = ( -1.03241185575894E+00,  7.22973187529681E-01)
-
-X( 5) = ( -8.11851739177183E-03, -6.50009183381276E-01)
-
-PATH NUMBER =      4868
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.15336101920123E-01, -5.18574349682473E-01)
-X( 2) = ( -8.50523107861879E-01, -1.87388826404711E-01)
-X( 3) = (  1.01071301301413E-01, -1.05032225847091E+00)
-X( 4) = ( -9.81985518051579E-01,  6.50613445628979E-01)
-
-X( 5) = ( -2.56447375035520E-02, -4.98259746396623E-01)
-
-PATH NUMBER =      4869
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.42863465325709E-01, -5.78393581178024E-01)
-X( 2) = ( -4.56485075274853E-01, -9.65206217133688E-02)
-X( 3) = ( -8.21094940012280E-02, -1.33817172499034E+00)
-X( 4) = ( -8.96844756730124E-01,  6.27596092520586E-01)
-
-X( 5) = ( -8.42734044309943E-02, -4.17220815867515E-01)
-
-PATH NUMBER =      4870
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25205366924634E+00, -1.16430752630530E-01)
-X( 2) = ( -8.02150706081657E-02,  2.09797292710887E-01)
-X( 3) = (  1.70057630427066E-01, -1.78644405556293E+00)
-X( 4) = ( -1.03040720514133E+00,  3.88888727011574E-01)
-
-X( 5) = ( -2.65924238331979E-01, -3.36468138147214E-01)
-
-PATH NUMBER =      4871
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.36783864199383E+00,  1.95733233636299E-01)
-X( 2) = ( -1.01278796800300E-01,  6.13628100336784E-01)
-X( 3) = (  4.21725005467950E-01, -2.01682645828341E+00)
-X( 4) = ( -9.92954999297720E-01,  4.68739087436315E-01)
-
-X( 5) = ( -3.23249727111231E-01, -2.73066986321168E-01)
-
-PATH NUMBER =      4872
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25587993440104E+00,  5.09289866527850E-01)
-X( 2) = ( -3.76991986752799E-01,  9.09440944268719E-01)
-X( 3) = (  7.62600353590898E-01, -2.03154094724122E+00)
-X( 4) = ( -1.01559176743870E+00,  5.53981826192440E-01)
-
-X( 5) = ( -4.02890723992321E-01, -2.26731234325577E-01)
-
-PATH NUMBER =      4873
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.68564270033091E-01,  6.77522512720360E-01)
-X( 2) = ( -7.78345374676103E-01,  9.58821707237381E-01)
-X( 3) = (  1.03318431100168E+00, -1.82370244951967E+00)
-X( 4) = ( -1.08772551417146E+00,  6.04730918448440E-01)
-
-X( 5) = ( -5.24291843403715E-01, -2.08081291515239E-01)
-
-PATH NUMBER =      4874
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.40329841405657E-01,  6.21713247362757E-01)
-X( 2) = ( -1.11754124981485E+00,  7.38664581443684E-01)
-X( 3) = (  1.10686763682207E+00, -1.49056090807028E+00)
-X( 4) = ( -1.17560405772243E+00,  5.97240299924400E-01)
-
-X( 5) = ( -7.10345426990827E-01, -2.91816319955801E-01)
-
-PATH NUMBER =      4875
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.24761185592855E-01,  3.67975845966757E-01)
-X( 2) = ( -1.23586609244938E+00,  3.51983532820408E-01)
-X( 3) = (  9.49173084001762E-01, -1.18799695259304E+00)
-X( 4) = ( -1.23810805090291E+00,  5.35014914276669E-01)
-
-X( 5) = ( -7.51841558982276E-01, -6.48554239332425E-01)
-
-PATH NUMBER =      4876
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.22725272428238E-01,  3.50368586226506E-02)
-X( 2) = ( -1.07795439367684E+00, -2.02890785004551E-02)
-X( 3) = (  6.33887686385113E-01, -1.05758362047955E+00)
-X( 4) = ( -1.24599118064922E+00,  4.47170711007950E-01)
-
-X( 5) = ( -3.73060181993726E-01, -7.52460107931274E-01)
-
-PATH NUMBER =      4877
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.35174728308187E-01, -2.21317862286575E-01)
-X( 2) = ( -7.17694792345963E-01, -2.03962760332656E-01)
-X( 3) = (  3.08536985523837E-01, -1.16034275920846E+00)
-X( 4) = ( -1.19556484294186E+00,  3.74810969107248E-01)
-
-X( 5) = ( -2.25501913568559E-01, -5.63202002577241E-01)
-
-PATH NUMBER =      4878
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.62702091713772E-01, -2.81137093782127E-01)
-X( 2) = ( -3.23656759758937E-01, -1.13094555641315E-01)
-X( 3) = (  1.25356190221197E-01, -1.44819222572790E+00)
-X( 4) = ( -1.11042408162040E+00,  3.51793615998856E-01)
-
-X( 5) = ( -2.26472791480366E-01, -4.25478744567761E-01)
-
-PATH NUMBER =      4879
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07617815175301E+00,  1.24032950955612E-01)
-X( 2) = (  3.21908417543030E-02,  2.82481318153928E-01)
-X( 3) = (  3.99705379649139E-01, -1.73736827752879E+00)
-X( 4) = ( -1.01673604550960E+00,  4.03256287489606E-02)
-
-X( 5) = ( -4.19860065297961E-01, -3.12346796937141E-01)
-
-PATH NUMBER =      4880
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19196312450049E+00,  4.36196937222440E-01)
-X( 2) = (  1.11271155621689E-02,  6.86312125779825E-01)
-X( 3) = (  6.51372754690023E-01, -1.96775068024927E+00)
-X( 4) = ( -9.79283839665990E-01,  1.20175989173703E-01)
-
-X( 5) = ( -4.42046794157020E-01, -1.95316652610289E-01)
-
-PATH NUMBER =      4881
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08000441690771E+00,  7.49753570113991E-01)
-X( 2) = ( -2.64586074390330E-01,  9.82124969711760E-01)
-X( 3) = (  9.92248102812971E-01, -1.98246516920708E+00)
-X( 4) = ( -1.00192060780697E+00,  2.05418727929826E-01)
-
-X( 5) = ( -4.89560293195603E-01, -9.23503841535123E-02)
-
-PATH NUMBER =      4882
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.92688752539753E-01,  9.17986216306501E-01)
-X( 2) = ( -6.65939462313635E-01,  1.03150573268042E+00)
-X( 3) = (  1.26283206022375E+00, -1.77462667148552E+00)
-X( 4) = ( -1.07405435453973E+00,  2.56167820185827E-01)
-
-X( 5) = ( -5.76077053687675E-01,  1.15477116473232E-02)
-
-PATH NUMBER =      4883
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.64454323912320E-01,  8.62176950948898E-01)
-X( 2) = ( -1.00513533745238E+00,  8.11348606886726E-01)
-X( 3) = (  1.33651538604414E+00, -1.44148513003613E+00)
-X( 4) = ( -1.16193289809070E+00,  2.48677201661787E-01)
-
-X( 5) = ( -7.57000894339841E-01,  1.13642438839278E-01)
-
-PATH NUMBER =      4884
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.48885668099518E-01,  6.08439549552898E-01)
-X( 2) = ( -1.12346018008691E+00,  4.24667558263450E-01)
-X( 3) = (  1.17882083322383E+00, -1.13892117455889E+00)
-X( 4) = ( -1.22443689127118E+00,  1.86451816014057E-01)
-
-X( 5) = ( -1.17491624197167E+00,  4.27379877374919E-02)
-
-PATH NUMBER =      4885
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.46849754934901E-01,  2.75500562208792E-01)
-X( 2) = ( -9.65548481314376E-01,  5.23949469425861E-02)
-X( 3) = (  8.63535435607186E-01, -1.00850784244541E+00)
-X( 4) = ( -1.23232002101749E+00,  9.86076127453368E-02)
-
-X( 5) = ( -1.17905885387987E+00, -7.23187259059398E-01)
-
-PATH NUMBER =      4886
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.59299210814849E-01,  1.91458412995658E-02)
-X( 2) = ( -6.05288879983495E-01, -1.31278734889615E-01)
-X( 3) = (  5.38184734745910E-01, -1.11126698117432E+00)
-X( 4) = ( -1.18189368331013E+00,  2.62478708446354E-02)
-
-X( 5) = ( -5.84273544573740E-01, -7.02273781669628E-01)
-
-PATH NUMBER =      4887
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.86826574220435E-01, -4.06733901959852E-02)
-X( 2) = ( -2.11250847396468E-01, -4.04105301982736E-02)
-X( 3) = (  3.55003939443270E-01, -1.39911644769375E+00)
-X( 4) = ( -1.09675292198868E+00,  3.23051773624248E-03)
-
-X( 5) = ( -4.36411748614601E-01, -4.69461250981130E-01)
-
-PATH NUMBER =      4888
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.86882599652052E-01,  1.95188231367659E-01)
-X( 2) = (  7.15783753163629E-02,  4.10413639670193E-01)
-X( 3) = (  5.44080459759413E-01, -1.55215932268164E+00)
-X( 4) = ( -7.82211288885564E-01, -2.17901543730125E-01)
-
-X( 5) = ( -7.01604359659598E-01, -3.37520879433341E-01)
-
-PATH NUMBER =      4889
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.02667572399537E-01,  5.07352217634488E-01)
-X( 2) = (  5.05146491242289E-02,  8.14244447296091E-01)
-X( 3) = (  7.95747834800297E-01, -1.78254172540212E+00)
-X( 4) = ( -7.44759083041953E-01, -1.38051183305384E-01)
-
-X( 5) = ( -6.41458524955625E-01, -1.06767969552369E-01)
-
-PATH NUMBER =      4890
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.90708864806754E-01,  8.20908850526039E-01)
-X( 2) = ( -2.25198540828270E-01,  1.11005729122803E+00)
-X( 3) = (  1.13662318292324E+00, -1.79725621435993E+00)
-X( 4) = ( -7.67395851182935E-01, -5.28084445492600E-02)
-
-X( 5) = ( -6.15476615816416E-01,  8.16088747437550E-02)
-
-PATH NUMBER =      4891
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.03393200438799E-01,  9.89141496718549E-01)
-X( 2) = ( -6.26551928751575E-01,  1.15943805419669E+00)
-X( 3) = (  1.40720714033402E+00, -1.58941771663838E+00)
-X( 4) = ( -8.39529597915690E-01, -2.05935229325946E-03)
-
-X( 5) = ( -6.09428359064443E-01,  2.77311287165240E-01)
-
-PATH NUMBER =      4892
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.75158771811366E-01,  9.33332231360945E-01)
-X( 2) = ( -9.65747803890322E-01,  9.39280928402991E-01)
-X( 3) = (  1.48089046615442E+00, -1.25627617518898E+00)
-X( 4) = ( -9.27408141466666E-01, -9.54997081729944E-03)
-
-X( 5) = ( -6.34367224364032E-01,  5.38547352759025E-01)
-
-PATH NUMBER =      4893
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.04098840014362E-02,  6.79594829964946E-01)
-X( 2) = ( -1.08407264652485E+00,  5.52599879779715E-01)
-X( 3) = (  1.32319591333411E+00, -9.53712219711744E-01)
-X( 4) = ( -9.89912134647139E-01, -7.17753564650302E-02)
-
-X( 5) = ( -7.86751697201679E-01,  1.01982672085299E+00)
-
-PATH NUMBER =      4894
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.24457971660524E-02,  3.46655842620840E-01)
-X( 2) = ( -9.26160947752316E-01,  1.80327268458852E-01)
-X( 3) = (  1.00791051571746E+00, -8.23298887598259E-01)
-X( 4) = ( -9.97795264393458E-01, -1.59619559733749E-01)
-
-X( 5) = ( -2.40040531816136E+00,  2.05392770182992E+00)
-
-PATH NUMBER =      4895
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.70003658713896E-01,  9.03011217116135E-02)
-X( 2) = ( -5.65901346421435E-01, -3.34641337334959E-03)
-X( 3) = (  6.82559814856184E-01, -9.26058026327170E-01)
-X( 4) = ( -9.47368926686093E-01, -2.31979301634451E-01)
-
-X( 5) = ( -1.89011198322620E+00, -1.50179930852145E+00)
-
-PATH NUMBER =      4896
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.97531022119482E-01,  3.04818902160624E-02)
-X( 2) = ( -1.71863313834409E-01,  8.75217913179920E-02)
-X( 3) = (  4.99379019553543E-01, -1.21390749284660E+00)
-X( 4) = ( -8.62228165364638E-01, -2.54996654742844E-01)
-
-X( 5) = ( -8.76084589945762E-01, -7.13259883717479E-01)
-
-PATH NUMBER =      4897
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.19531616933444E-01,  6.37407420979606E-02)
-X( 2) = (  1.95176653806508E-02,  5.33733302212844E-01)
-X( 3) = (  5.35628166224005E-01, -1.31747851936272E+00)
-X( 4) = ( -4.36569675345943E-01, -2.64965426547373E-01)
-
-X( 5) = ( -1.34453152186352E+00, -9.55079258894362E-01)
-
-PATH NUMBER =      4898
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.35316589680929E-01,  3.75904728364790E-01)
-X( 2) = ( -1.54606081148324E-03,  9.37564109838742E-01)
-X( 3) = (  7.87295541264889E-01, -1.54786092208321E+00)
-X( 4) = ( -3.99117469502332E-01, -1.85115066122631E-01)
-
-X( 5) = ( -1.16771592075722E+00, -6.40268267534849E-02)
-
-PATH NUMBER =      4899
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.23357882088146E-01,  6.89461361256340E-01)
-X( 2) = ( -2.77259250763982E-01,  1.23337695377068E+00)
-X( 3) = (  1.12817088938784E+00, -1.56257541104101E+00)
-X( 4) = ( -4.21754237643315E-01, -9.98723273665074E-02)
-
-X( 5) = ( -8.92719317453927E-01,  3.99118955336091E-01)
-
-PATH NUMBER =      4900
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.36042217720192E-01,  8.57694007448851E-01)
-X( 2) = ( -6.78612638687287E-01,  1.28275771673934E+00)
-X( 3) = (  1.39875484679862E+00, -1.35473691331946E+00)
-X( 4) = ( -4.93887984376070E-01, -4.91232351105069E-02)
-
-X( 5) = ( -5.98082139930639E-01,  7.07991705178198E-01)
-
-PATH NUMBER =      4901
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.21922109072413E-02,  8.01884742091247E-01)
-X( 2) = ( -1.01780851382603E+00,  1.06260059094564E+00)
-X( 3) = (  1.47243817261901E+00, -1.02159537187007E+00)
-X( 4) = ( -5.81766527927045E-01, -5.66138536345470E-02)
-
-X( 5) = ( -2.45366987315441E-01,  9.53749047142176E-01)
-
-PATH NUMBER =      4902
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.07760866720044E-01,  5.48147340695248E-01)
-X( 2) = ( -1.13613335646056E+00,  6.75919542322366E-01)
-X( 3) = (  1.31474361979870E+00, -7.19031416392827E-01)
-X( 4) = ( -6.44270521107518E-01, -1.18839239282278E-01)
-
-X( 5) = (  2.66527577167227E-01,  1.15757306935130E+00)
-
-PATH NUMBER =      4903
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.09796779884660E-01,  2.15208353351141E-01)
-X( 2) = ( -9.78221657688028E-01,  3.03646931001502E-01)
-X( 3) = (  9.99458222182052E-01, -5.88618084279342E-01)
-X( 4) = ( -6.52153650853837E-01, -2.06683442550997E-01)
-
-X( 5) = (  1.21474238427642E+00,  1.18270575184187E+00)
-
-PATH NUMBER =      4904
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.73473240047121E-02, -4.11463675580847E-02)
-X( 2) = ( -6.17962056357147E-01,  1.19973249169301E-01)
-X( 3) = (  6.74107521320776E-01, -6.91377223008253E-01)
-X( 4) = ( -6.01727313146472E-01, -2.79043184451699E-01)
-
-X( 5) = (  2.88364050302315E+00, -4.42764638118545E-01)
-
-PATH NUMBER =      4905
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.30180039400874E-01, -1.00965599053636E-01)
-X( 2) = ( -2.23924023770121E-01,  2.10841453860643E-01)
-X( 3) = (  4.90926726018136E-01, -9.79226689527687E-01)
-X( 4) = ( -5.16586551825018E-01, -3.02060537560092E-01)
-
-X( 5) = ( -1.86192564463823E-01, -2.81899664875922E+00)
-
-PATH NUMBER =      4906
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.99221699686423E-01, -2.08803775748074E-01)
-X( 2) = ( -9.96315032835714E-02,  5.94737665132788E-01)
-X( 3) = (  3.78303421124912E-01, -1.14313562363156E+00)
-X( 4) = ( -1.41540757244573E-01, -7.88443058757971E-02)
-
-X( 5) = (  3.59724927939586E-01, -1.52869658197940E+00)
-
-PATH NUMBER =      4907
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.15006672433908E-01,  1.03360210518755E-01)
-X( 2) = ( -1.20695229475705E-01,  9.98568472758686E-01)
-X( 3) = (  6.29970796165796E-01, -1.37351802635205E+00)
-X( 4) = ( -1.04088551400963E-01,  1.00605454894478E-03)
-
-X( 5) = ( -1.47146116457402E+00, -2.17320022455221E+00)
-
-PATH NUMBER =      4908
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.03047964841125E-01,  4.16916843410306E-01)
-X( 2) = ( -3.96408419428205E-01,  1.29438131669062E+00)
-X( 3) = (  9.70846144288744E-01, -1.38823251530985E+00)
-X( 4) = ( -1.26725319541946E-01,  8.62487933050686E-02)
-
-X( 5) = ( -2.71188251723415E+00,  1.37439616631637E+00)
-
-PATH NUMBER =      4909
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15732300473171E-01,  5.85149489602816E-01)
-X( 2) = ( -7.97761807351509E-01,  1.34376207965928E+00)
-X( 3) = (  1.24143010169952E+00, -1.18039401758830E+00)
-X( 4) = ( -1.98859066274701E-01,  1.36997885561069E-01)
-
-X( 5) = ( -1.79965326209471E-01,  1.78181639533450E+00)
-
-PATH NUMBER =      4910
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.12502128154262E-01,  5.29340224245212E-01)
-X( 2) = ( -1.13695768249026E+00,  1.12360495386559E+00)
-X( 3) = (  1.31511342751991E+00, -8.47252476138908E-01)
-X( 4) = ( -2.86737609825676E-01,  1.29507267037029E-01)
-
-X( 5) = (  5.85992469209821E-01,  1.08170840878648E+00)
-
-PATH NUMBER =      4911
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.28070783967065E-01,  2.75602822849213E-01)
-X( 2) = ( -1.25528252512478E+00,  7.36923905242310E-01)
-X( 3) = (  1.15741887469961E+00, -5.44688520661667E-01)
-X( 4) = ( -3.49241603006148E-01,  6.72818813892981E-02)
-
-X( 5) = (  8.35988973317017E-01,  5.56298449207019E-01)
-
-PATH NUMBER =      4912
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.30106697131681E-01, -5.73361644948932E-02)
-X( 2) = ( -1.09737082635225E+00,  3.64651293921447E-01)
-X( 3) = (  8.42133477082959E-01, -4.14275188548183E-01)
-X( 4) = ( -3.57124732752467E-01, -2.05623218794210E-02)
-
-X( 5) = (  9.24242515335225E-01,  1.24160620992896E-01)
-
-PATH NUMBER =      4913
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.17657241251733E-01, -3.13690885404119E-01)
-X( 2) = ( -7.37111225021369E-01,  1.80977612089246E-01)
-X( 3) = (  5.16782776221684E-01, -5.17034327277093E-01)
-X( 4) = ( -3.06698395045103E-01, -9.29220637801228E-02)
-
-X( 5) = (  9.22475500908464E-01, -3.02201286926046E-01)
-
-PATH NUMBER =      4914
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09870122153852E-01, -3.73510116899671E-01)
-X( 2) = ( -3.43073192434343E-01,  2.71845816780587E-01)
-X( 3) = (  3.33601980919043E-01, -8.04883793796527E-01)
-X( 4) = ( -2.21557633723648E-01, -1.15939416888516E-01)
-
-X( 5) = (  8.03979514312869E-01, -8.10542208521407E-01)
-
-PATH NUMBER =      4915
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.82247195286661E-01, -4.94918713275368E-01)
-X( 2) = ( -2.30117910462806E-01,  5.64882109031812E-01)
-X( 3) = (  1.45720221163781E-01, -1.11070761400623E+00)
-X( 4) = ( -3.51718442422778E-02,  2.53373677416525E-01)
-
-X( 5) = (  2.65577821794475E-01, -7.08794981307708E-01)
-
-PATH NUMBER =      4916
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.98032168034146E-01, -1.82754727008539E-01)
-X( 2) = ( -2.51181636654940E-01,  9.68712916657709E-01)
-X( 3) = (  3.97387596204665E-01, -1.34109001672671E+00)
-X( 4) = (  2.28036160133273E-03,  3.33224037841267E-01)
-
-X( 5) = (  1.18123445044231E-01, -1.05882489485743E+00)
-
-PATH NUMBER =      4917
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.86073460441363E-01,  1.30801905883012E-01)
-X( 2) = ( -5.26894826607439E-01,  1.26452576058964E+00)
-X( 3) = (  7.38262944327613E-01, -1.35580450568452E+00)
-X( 4) = ( -2.03564065396497E-02,  4.18466776597390E-01)
-
-X( 5) = (  1.10370013675913E-01, -2.12812628411304E+00)
-
-PATH NUMBER =      4918
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.98757796073409E-01,  2.99034552075522E-01)
-X( 2) = ( -9.28248214530743E-01,  1.31390652355831E+00)
-X( 3) = (  1.00884690173839E+00, -1.14796600796296E+00)
-X( 4) = ( -9.24901532724047E-02,  4.69215868853391E-01)
-
-X( 5) = (  3.62096964993294E+00, -8.55057593557743E-01)
-
-PATH NUMBER =      4919
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.29476632554025E-01,  2.43225286717919E-01)
-X( 2) = ( -1.26744408966949E+00,  1.09374939776461E+00)
-X( 3) = (  1.08253022755878E+00, -8.14824466513571E-01)
-X( 4) = ( -1.80368696823380E-01,  4.61725250329351E-01)
-
-X( 5) = (  1.39211376886336E+00,  1.92338766245198E-01)
-
-PATH NUMBER =      4920
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.45045288366827E-01, -1.05121146780807E-02)
-X( 2) = ( -1.38576893230402E+00,  7.07068349141334E-01)
-X( 3) = (  9.24835674738477E-01, -5.12260511036330E-01)
-X( 4) = ( -2.42872690003852E-01,  3.99499864681620E-01)
-
-X( 5) = (  8.69171459799675E-01, -4.97459788248676E-02)
-
-PATH NUMBER =      4921
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.47081201531443E-01, -3.43451102022187E-01)
-X( 2) = ( -1.22785723353148E+00,  3.34795737820470E-01)
-X( 3) = (  6.09550277121828E-01, -3.81847178922845E-01)
-X( 4) = ( -2.50755819750171E-01,  3.11655661412901E-01)
-
-X( 5) = (  6.47829710714070E-01, -2.22698435417494E-01)
-
-PATH NUMBER =      4922
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.34631745651495E-01, -5.99805822931413E-01)
-X( 2) = ( -8.67597632200604E-01,  1.51122055988269E-01)
-X( 3) = (  2.84199576260552E-01, -4.84606317651756E-01)
-X( 4) = ( -2.00329482042807E-01,  2.39295919512199E-01)
-
-X( 5) = (  5.06260695584541E-01, -3.66239697565544E-01)
-
-PATH NUMBER =      4923
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.92895617754091E-01, -6.59625054426965E-01)
-X( 2) = ( -4.73559599613577E-01,  2.41990260679610E-01)
-X( 3) = (  1.01018780957912E-01, -7.72455784171190E-01)
-X( 4) = ( -1.15188720721352E-01,  2.16278566403807E-01)
-
-X( 5) = (  3.87934946793101E-01, -5.14404583191557E-01)
-
-PATH NUMBER =      4924
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.29759551617206E-01, -6.60727711401568E-01)
-X( 2) = ( -3.10885516043010E-01,  4.58136380417107E-01)
-X( 3) = ( -5.32931695232362E-02, -1.23536791658759E+00)
-X( 4) = ( -1.67234132891617E-01,  5.76240036755504E-01)
-
-X( 5) = (  8.24623335132458E-02, -5.09033941707348E-01)
-
-PATH NUMBER =      4925
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.45544524364691E-01, -3.48563725134739E-01)
-X( 2) = ( -3.31949242235144E-01,  8.61967188043004E-01)
-X( 3) = (  1.98374205517647E-01, -1.46575031930807E+00)
-X( 4) = ( -1.29781927048007E-01,  6.56090397180246E-01)
-
-X( 5) = ( -1.90316389320871E-02, -6.20555895803423E-01)
-
-PATH NUMBER =      4926
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.33585816771908E-01, -3.50070922431882E-02)
-X( 2) = ( -6.07662432187643E-01,  1.15778003197494E+00)
-X( 3) = (  5.39249553640596E-01, -1.48046480826588E+00)
-X( 4) = ( -1.52418695188989E-01,  7.41333135936369E-01)
-
-X( 5) = ( -9.71390403342193E-02, -8.61844272528241E-01)
-
-PATH NUMBER =      4927
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.46270152403954E-01,  1.33225553949322E-01)
-X( 2) = ( -1.00901582011095E+00,  1.20716079494360E+00)
-X( 3) = (  8.09833511051375E-01, -1.27262631054433E+00)
-X( 4) = ( -2.24552441921745E-01,  7.92082228192370E-01)
-
-X( 5) = (  1.93924689890225E-01, -1.32501569190009E+00)
-
-PATH NUMBER =      4928
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18035723776520E-01,  7.74162885917184E-02)
-X( 2) = ( -1.34821169524969E+00,  9.87003669149904E-01)
-X( 3) = (  8.83516836871766E-01, -9.39484769094935E-01)
-X( 4) = ( -3.12430985472720E-01,  7.84591609668330E-01)
-
-X( 5) = (  8.61402955330302E-01, -9.05593216261942E-01)
-
-PATH NUMBER =      4929
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.75329320362820E-02, -1.76321112804281E-01)
-X( 2) = ( -1.46653653788422E+00,  6.00322620526628E-01)
-X( 3) = (  7.25822284051459E-01, -6.36920813617694E-01)
-X( 4) = ( -3.74934978653192E-01,  7.22366224020599E-01)
-
-X( 5) = (  6.45702800175927E-01, -4.82816467134238E-01)
-
-PATH NUMBER =      4930
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.95688452008985E-02, -5.09260100148388E-01)
-X( 2) = ( -1.30862483911169E+00,  2.28050009205765E-01)
-X( 3) = (  4.10536886434810E-01, -5.06507481504209E-01)
-X( 4) = ( -3.82818108399511E-01,  6.34522020751880E-01)
-
-X( 5) = (  4.33282595610363E-01, -4.06667451240237E-01)
-
-PATH NUMBER =      4931
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12880610679050E-01, -7.65614821057614E-01)
-X( 2) = ( -9.48365237780808E-01,  4.43763273735640E-02)
-X( 3) = (  8.51861855735350E-02, -6.09266620233120E-01)
-X( 4) = ( -3.32391770692146E-01,  5.62162278851178E-01)
-
-X( 5) = (  2.91961685541080E-01, -4.12482860033046E-01)
-
-PATH NUMBER =      4932
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.40407974084636E-01, -8.25434052553165E-01)
-X( 2) = ( -5.54327205193782E-01,  1.35244532064905E-01)
-X( 3) = ( -9.79946097291059E-02, -8.97116086752553E-01)
-X( 4) = ( -2.47251009370692E-01,  5.39144925742786E-01)
-
-X( 5) = (  1.82397428741069E-01, -4.47486247801758E-01)
-
-PATH NUMBER =      4933
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02594498635756E+00, -6.28646897141675E-01)
-X( 2) = ( -3.04142259741256E-01,  3.24447992054121E-01)
-X( 3) = ( -1.25616173646216E-01, -1.45878659035290E+00)
-X( 4) = ( -4.75934210624716E-01,  7.38682014346540E-01)
-
-X( 5) = ( -4.40585757791796E-02, -4.23807272625906E-01)
-
-PATH NUMBER =      4934
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14172995910505E+00, -3.16482910874846E-01)
-X( 2) = ( -3.25205985933390E-01,  7.28278799680019E-01)
-X( 3) = (  1.26051201394668E-01, -1.68916899307338E+00)
-X( 4) = ( -4.38482004781105E-01,  8.18532374771282E-01)
-
-X( 5) = ( -1.34304131146981E-01, -4.52770073113042E-01)
-
-PATH NUMBER =      4935
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02977125151227E+00, -2.92627798329470E-03)
-X( 2) = ( -6.00919175885889E-01,  1.02409164361195E+00)
-X( 3) = (  4.66926549517616E-01, -1.70388348203119E+00)
-X( 4) = ( -4.61118772922087E-01,  9.03775113527406E-01)
-
-X( 5) = ( -2.33791646523099E-01, -5.36828262553469E-01)
-
-PATH NUMBER =      4936
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.42455587144312E-01,  1.65306368209215E-01)
-X( 2) = ( -1.00227256380919E+00,  1.07347240658062E+00)
-X( 3) = (  7.37510506928394E-01, -1.49604498430963E+00)
-X( 4) = ( -5.33252519654843E-01,  9.54524205783407E-01)
-
-X( 5) = ( -2.88566657396519E-01, -7.52140600556163E-01)
-
-PATH NUMBER =      4937
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14221158516879E-01,  1.09497102851612E-01)
-X( 2) = ( -1.34146843894794E+00,  8.53315280786919E-01)
-X( 3) = (  8.11193832748786E-01, -1.16290344286024E+00)
-X( 4) = ( -6.21131063205818E-01,  9.47033587259367E-01)
-
-X( 5) = ( -1.34876328084470E-03, -1.00020945058677E+00)
-
-PATH NUMBER =      4938
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.98652502704076E-01, -1.44240298544388E-01)
-X( 2) = ( -1.45979328158247E+00,  4.66634232163643E-01)
-X( 3) = (  6.53499279928479E-01, -8.60339487383000E-01)
-X( 4) = ( -6.83635056386291E-01,  8.84808201611636E-01)
-
-X( 5) = (  2.84917039729196E-01, -7.52042414160208E-01)
-
-PATH NUMBER =      4939
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.96616589539460E-01, -4.77179285888494E-01)
-X( 2) = ( -1.30188158280993E+00,  9.43616208427798E-02)
-X( 3) = (  3.38213882311830E-01, -7.29926155269515E-01)
-X( 4) = ( -6.91518186132609E-01,  7.96963998342917E-01)
-
-X( 5) = (  2.30518008915851E-01, -5.37350808137245E-01)
-
-PATH NUMBER =      4940
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.09066045419408E-01, -7.33534006797720E-01)
-X( 2) = ( -9.41621981479054E-01, -8.93120609894213E-02)
-X( 3) = (  1.28631814505550E-02, -8.32685293998426E-01)
-X( 4) = ( -6.41091848425245E-01,  7.24604256442215E-01)
-
-X( 5) = (  1.31480982224655E-01, -4.53204002636223E-01)
-
-PATH NUMBER =      4941
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.36593408824993E-01, -7.93353238293272E-01)
-X( 2) = ( -5.47583948892028E-01,  1.55614370191999E-03)
-X( 3) = ( -1.70317613852086E-01, -1.12053476051786E+00)
-X( 4) = ( -5.55951087103790E-01,  7.01586903333822E-01)
-
-X( 5) = (  4.14310500897705E-02, -4.23961850319640E-01)
-
-PATH NUMBER =      4942
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25717822772612E+00, -3.54002382080167E-01)
-X( 2) = ( -1.23958241585363E-01, -5.87235925736378E-02)
-X( 3) = (  2.95305759279001E-01, -1.26592490856187E+00)
-X( 4) = ( -9.48985179528260E-01,  4.38233892893432E-01)
-
-X( 5) = ( -2.84107436530233E-01, -2.95243357320124E-01)
-
-PATH NUMBER =      4943
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.37296320047360E+00, -4.18383958133376E-02)
-X( 2) = ( -1.45021967777497E-01,  3.45107215052259E-01)
-X( 3) = (  5.46973134319885E-01, -1.49630731128235E+00)
-X( 4) = ( -9.11532973684650E-01,  5.18084253318174E-01)
-
-X( 5) = ( -3.24408531674921E-01, -2.29939653831708E-01)
-
-PATH NUMBER =      4944
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26100449288082E+00,  2.71718237078213E-01)
-X( 2) = ( -4.20735157729996E-01,  6.40920058984194E-01)
-X( 3) = (  8.87848482442833E-01, -1.51102180024015E+00)
-X( 4) = ( -9.34169741825633E-01,  6.03326992074298E-01)
-
-X( 5) = ( -3.85892193044400E-01, -1.79244837109180E-01)
-
-PATH NUMBER =      4945
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.73688828512868E-01,  4.39950883270723E-01)
-X( 2) = ( -8.22088545653301E-01,  6.90300821952856E-01)
-X( 3) = (  1.15843243985361E+00, -1.30318330251860E+00)
-X( 4) = ( -1.00630348855839E+00,  6.54076084330299E-01)
-
-X( 5) = ( -4.82207269255348E-01, -1.48465265264170E-01)
-
-PATH NUMBER =      4946
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.45454399885434E-01,  3.84141617913120E-01)
-X( 2) = ( -1.16128442079205E+00,  4.70143696159159E-01)
-X( 3) = (  1.23211576567400E+00, -9.70041761069209E-01)
-X( 4) = ( -1.09418203210936E+00,  6.46585465806258E-01)
-
-X( 5) = ( -6.34971575877300E-01, -1.85576690096676E-01)
-
-PATH NUMBER =      4947
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.29885744072631E-01,  1.30404216517120E-01)
-X( 2) = ( -1.27960926342657E+00,  8.34626475358835E-02)
-X( 3) = (  1.07442121285370E+00, -6.67477805591969E-01)
-X( 4) = ( -1.15668602528983E+00,  5.84360080158527E-01)
-
-X( 5) = ( -7.40403160359183E-01, -4.30771303350490E-01)
-
-PATH NUMBER =      4948
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.27849830908015E-01, -2.02534770826986E-01)
-X( 2) = ( -1.12169756465404E+00, -2.88809963784979E-01)
-X( 3) = (  7.59135815237047E-01, -5.37064473478484E-01)
-X( 4) = ( -1.16456915503615E+00,  4.96515876889808E-01)
-
-X( 5) = ( -4.86667763186383E-01, -6.25173161430346E-01)
-
-PATH NUMBER =      4949
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.40299286787963E-01, -4.58889491736212E-01)
-X( 2) = ( -7.61437963323161E-01, -4.72483645617180E-01)
-X( 3) = (  4.33785114375772E-01, -6.39823612207395E-01)
-X( 4) = ( -1.11414281732879E+00,  4.24156134989107E-01)
-
-X( 5) = ( -2.99541207670015E-01, -5.08846324858168E-01)
-
-PATH NUMBER =      4950
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.67826650193549E-01, -5.18708723231763E-01)
-X( 2) = ( -3.67399930736135E-01, -3.81615440925839E-01)
-X( 3) = (  2.50604319073131E-01, -9.27673078726828E-01)
-X( 4) = ( -1.02900205600733E+00,  4.01138781880714E-01)
-
-X( 5) = ( -2.65990870363398E-01, -3.83467214194573E-01)
-
-PATH NUMBER =      4951
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.27701685411418E+00, -5.67458946842691E-02)
-X( 2) = (  8.87007393055255E-03, -7.52975265015835E-02)
-X( 3) = (  5.02771443501426E-01, -1.37594540929942E+00)
-X( 4) = ( -1.16256450441854E+00,  1.62431416371702E-01)
-
-X( 5) = ( -3.38483237265061E-01, -1.97862283286161E-01)
-
-PATH NUMBER =      4952
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.39280182686167E+00,  2.55418091582560E-01)
-X( 2) = ( -1.21936522615815E-02,  3.28533281124314E-01)
-X( 3) = (  7.54438818542310E-01, -1.60632781201990E+00)
-X( 4) = ( -1.12511229857493E+00,  2.42281776796443E-01)
-
-X( 5) = ( -3.40304886105670E-01, -1.30576876938469E-01)
-
-PATH NUMBER =      4953
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.28084311926888E+00,  5.68974724474111E-01)
-X( 2) = ( -2.87906842214081E-01,  6.24346125056248E-01)
-X( 3) = (  1.09531416666526E+00, -1.62104230097771E+00)
-X( 4) = ( -1.14774906671591E+00,  3.27524515552567E-01)
-
-X( 5) = ( -3.64560644346682E-01, -7.15867948072338E-02)
-
-PATH NUMBER =      4954
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.93527454900930E-01,  7.37207370666620E-01)
-X( 2) = ( -6.89260230137385E-01,  6.73726888024910E-01)
-X( 3) = (  1.36589812407604E+00, -1.41320380325615E+00)
-X( 4) = ( -1.21988281344867E+00,  3.78273607808568E-01)
-
-X( 5) = ( -4.15091923745280E-01, -1.92996170070995E-02)
-
-PATH NUMBER =      4955
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.65293026273497E-01,  6.81398105309017E-01)
-X( 2) = ( -1.02845610527613E+00,  4.53569762231213E-01)
-X( 3) = (  1.43958144989643E+00, -1.08006226180676E+00)
-X( 4) = ( -1.30776135699964E+00,  3.70782989284527E-01)
-
-X( 5) = ( -5.09746443252485E-01,  1.23208128970711E-02)
-
-PATH NUMBER =      4956
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.49724370460695E-01,  4.27660703913019E-01)
-X( 2) = ( -1.14678094791066E+00,  6.68887136079379E-02)
-X( 3) = (  1.28188689707612E+00, -7.77498306329521E-01)
-X( 4) = ( -1.37026535018012E+00,  3.08557603636797E-01)
-
-X( 5) = ( -6.54651449475031E-01, -4.98437964107138E-02)
-
-PATH NUMBER =      4957
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.47688457296078E-01,  9.47217165689121E-02)
-X( 2) = ( -9.88869249138126E-01, -3.05383897712925E-01)
-X( 3) = (  9.66601499459472E-01, -6.47084974216036E-01)
-X( 4) = ( -1.37814847992643E+00,  2.20713400368078E-01)
-
-X( 5) = ( -6.67050108535000E-01, -2.72297047379333E-01)
-
-PATH NUMBER =      4958
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.60137913176026E-01, -1.61633004340314E-01)
-X( 2) = ( -6.28609647807245E-01, -4.89057579545126E-01)
-X( 3) = (  6.41250798598197E-01, -7.49844112944947E-01)
-X( 4) = ( -1.32772214221907E+00,  1.48353658467376E-01)
-
-X( 5) = ( -4.80306785787331E-01, -3.46693357249935E-01)
-
-PATH NUMBER =      4959
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.87665276581612E-01, -2.21452235835866E-01)
-X( 2) = ( -2.34571615220219E-01, -3.98189374853785E-01)
-X( 3) = (  4.58070003295556E-01, -1.03769357946438E+00)
-X( 4) = ( -1.24258138089762E+00,  1.25336305358983E-01)
-
-X( 5) = ( -3.71587711180606E-01, -2.76759475916903E-01)
-
-PATH NUMBER =      4960
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10114133662085E+00,  1.83717808901873E-01)
-X( 2) = (  1.21275986293021E-01, -2.61350105854221E-03)
-X( 3) = (  7.32419192723499E-01, -1.32686963126527E+00)
-X( 4) = ( -1.14889334478681E+00, -1.86131681890912E-01)
-
-X( 5) = ( -4.08872323338583E-01, -1.06873462460172E-01)
-
-PATH NUMBER =      4961
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21692630936833E+00,  4.95881795168702E-01)
-X( 2) = (  1.00212260100887E-01,  4.01217306567355E-01)
-X( 3) = (  9.84086567764383E-01, -1.55725203398575E+00)
-X( 4) = ( -1.11144113894320E+00, -1.06281321466170E-01)
-
-X( 5) = ( -3.72929973155535E-01, -4.14032315646293E-02)
-
-PATH NUMBER =      4962
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10496760177555E+00,  8.09438428060253E-01)
-X( 2) = ( -1.75500929851612E-01,  6.97030150499290E-01)
-X( 3) = (  1.32496191588733E+00, -1.57196652294356E+00)
-X( 4) = ( -1.13407790708418E+00, -2.10385827100471E-02)
-
-X( 5) = ( -3.65071486663113E-01,  2.27613933286426E-02)
-
-PATH NUMBER =      4963
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.17651937407592E-01,  9.77671074252763E-01)
-X( 2) = ( -5.76854317774917E-01,  7.46410913467951E-01)
-X( 3) = (  1.59554587329811E+00, -1.36412802522201E+00)
-X( 4) = ( -1.20621165381694E+00,  2.97105095459539E-02)
-
-X( 5) = ( -3.80961761388237E-01,  8.82308985731433E-02)
-
-PATH NUMBER =      4964
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.89417508780159E-01,  9.21861808895159E-01)
-X( 2) = ( -9.16050192913663E-01,  5.26253787674255E-01)
-X( 3) = (  1.66922919911850E+00, -1.03098648377262E+00)
-X( 4) = ( -1.29409019736791E+00,  2.22198910219145E-02)
-
-X( 5) = ( -4.32411113191197E-01,  1.55427625669065E-01)
-
-PATH NUMBER =      4965
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.73848852967357E-01,  6.68124407499160E-01)
-X( 2) = ( -1.03437503554819E+00,  1.39572739050979E-01)
-X( 3) = (  1.51153464629819E+00, -7.28422528295374E-01)
-X( 4) = ( -1.35659419054839E+00, -4.00054946258166E-02)
-
-X( 5) = ( -5.52292520601627E-01,  1.97078295276322E-01)
-
-PATH NUMBER =      4966
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.71812939802740E-01,  3.35185420155053E-01)
-X( 2) = ( -8.76463336775657E-01, -2.32699872269884E-01)
-X( 3) = (  1.19624924868154E+00, -5.98009196181890E-01)
-X( 4) = ( -1.36447732029470E+00, -1.27849697894536E-01)
-
-X( 5) = ( -7.18364178721209E-01,  8.59489371828500E-02)
-
-PATH NUMBER =      4967
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.84262395682689E-01,  7.88306992458274E-02)
-X( 2) = ( -5.16203735444776E-01, -4.16373554102085E-01)
-X( 3) = (  8.70898547820269E-01, -7.00768334910801E-01)
-X( 4) = ( -1.31405098258734E+00, -2.00209439795237E-01)
-
-X( 5) = ( -6.58880623190283E-01, -1.35412783569268E-01)
-
-PATH NUMBER =      4968
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.11789759088274E-01,  1.90114677502762E-02)
-X( 2) = ( -1.22165702857750E-01, -3.25505349410744E-01)
-X( 3) = (  6.87717752517629E-01, -9.88617801430235E-01)
-X( 4) = ( -1.22891022126589E+00, -2.23226792903630E-01)
-
-X( 5) = ( -4.95877739804011E-01, -1.63749647577064E-01)
-
-PATH NUMBER =      4969
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.11845784519892E-01,  2.54873089313921E-01)
-X( 2) = (  1.60663519855081E-01,  1.25318820457723E-01)
-X( 3) = (  8.76794272833772E-01, -1.14166067641813E+00)
-X( 4) = ( -9.14368588162774E-01, -4.44358854369998E-01)
-
-X( 5) = ( -5.22554814346680E-01, -3.98834790723164E-03)
-
-PATH NUMBER =      4970
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.27630757267377E-01,  5.67037075580750E-01)
-X( 2) = (  1.39599793662947E-01,  5.29149628083621E-01)
-X( 3) = (  1.12846164787466E+00, -1.37204307913861E+00)
-X( 4) = ( -8.76916382319164E-01, -3.64508493945257E-01)
-
-X( 5) = ( -4.32905538054884E-01,  5.51776289141630E-02)
-
-PATH NUMBER =      4971
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.15672049674593E-01,  8.80593708472300E-01)
-X( 2) = ( -1.36113396289552E-01,  8.24962472015555E-01)
-X( 3) = (  1.46933699599760E+00, -1.38675756809641E+00)
-X( 4) = ( -8.99553150460146E-01, -2.79265755189133E-01)
-
-X( 5) = ( -3.85447365013934E-01,  1.23509912145066E-01)
-
-PATH NUMBER =      4972
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.28356385306639E-01,  1.04882635466481E+00)
-X( 2) = ( -5.37466784212857E-01,  8.74343234984216E-01)
-X( 3) = (  1.73992095340838E+00, -1.17891907037486E+00)
-X( 4) = ( -9.71686897192902E-01, -2.28516662933133E-01)
-
-X( 5) = ( -3.63313060565894E-01,  1.99348363212361E-01)
-
-PATH NUMBER =      4973
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.00121956679206E-01,  9.93017089307207E-01)
-X( 2) = ( -8.76662659351603E-01,  6.54186109190520E-01)
-X( 3) = (  1.81360427922877E+00, -8.45777528925468E-01)
-X( 4) = ( -1.05956544074388E+00, -2.36007281457173E-01)
-
-X( 5) = ( -3.68446099771230E-01,  2.90824362515278E-01)
-
-PATH NUMBER =      4974
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.54466991335966E-02,  7.39279687911207E-01)
-X( 2) = ( -9.94987501986130E-01,  2.67505060567244E-01)
-X( 3) = (  1.65590972640847E+00, -5.43213573448227E-01)
-X( 4) = ( -1.12206943392435E+00, -2.98232667104904E-01)
-
-X( 5) = ( -4.31365244334760E-01,  4.05620638171661E-01)
-
-PATH NUMBER =      4975
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.74826122982128E-02,  4.06340700567101E-01)
-X( 2) = ( -8.37075803213597E-01, -1.04767550753618E-01)
-X( 3) = (  1.34062432879182E+00, -4.12800241334743E-01)
-X( 4) = ( -1.12995256367067E+00, -3.86076870373622E-01)
-
-X( 5) = ( -6.41839185797829E-01,  4.81716917984978E-01)
-
-PATH NUMBER =      4976
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.94966843581735E-01,  1.49985979657875E-01)
-X( 2) = ( -4.76816201882716E-01, -2.88441232585820E-01)
-X( 3) = (  1.01527362793054E+00, -5.15559380063654E-01)
-X( 4) = ( -1.07952622596330E+00, -4.58436612274324E-01)
-
-X( 5) = ( -8.65527552969012E-01,  2.27920509450033E-01)
-
-PATH NUMBER =      4977
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.22494206987321E-01,  9.01667481623241E-02)
-X( 2) = ( -8.27781692956902E-02, -1.97573027894478E-01)
-X( 3) = (  8.32092832627903E-01, -8.03408846583088E-01)
-X( 4) = ( -9.94385464641849E-01, -4.81453965382717E-01)
-
-X( 5) = ( -6.93115799196732E-01, -8.00505841051012E-03)
-
-PATH NUMBER =      4978
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.44494801801284E-01,  1.23425600044222E-01)
-X( 2) = (  1.08602809919369E-01,  2.48638483000374E-01)
-X( 3) = (  8.68341979298365E-01, -9.06979873099209E-01)
-X( 4) = ( -5.68726974623154E-01, -4.91422737187246E-01)
-
-X( 5) = ( -7.81469057798691E-01,  1.19406488918787E-01)
-
-PATH NUMBER =      4979
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.60279774548769E-01,  4.35589586311052E-01)
-X( 2) = (  8.75390837272352E-02,  6.52469290626271E-01)
-X( 3) = (  1.12000935433925E+00, -1.13736227581969E+00)
-X( 4) = ( -5.31274768779543E-01, -4.11572376762504E-01)
-
-X( 5) = ( -5.67419349369202E-01,  1.74600127860986E-01)
-
-PATH NUMBER =      4980
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.48321066955985E-01,  7.49146219202602E-01)
-X( 2) = ( -1.88174106225264E-01,  9.48282134558206E-01)
-X( 3) = (  1.46088470246220E+00, -1.15207676477750E+00)
-X( 4) = ( -5.53911536920526E-01, -3.26329638006381E-01)
-
-X( 5) = ( -4.47497880055332E-01,  2.54136878519709E-01)
-
-PATH NUMBER =      4981
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.61005402588032E-01,  9.17378865395112E-01)
-X( 2) = ( -5.89527494148568E-01,  9.97662897526868E-01)
-X( 3) = (  1.73146865987298E+00, -9.44238267055944E-01)
-X( 4) = ( -6.26045283653281E-01, -2.75580545750380E-01)
-
-X( 5) = ( -3.65230956782912E-01,  3.43614773459825E-01)
-
-PATH NUMBER =      4982
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.72290260394020E-02,  8.61569600037509E-01)
-X( 2) = ( -9.28723369287315E-01,  7.77505771733171E-01)
-X( 3) = (  1.80515198569337E+00, -6.11096725606551E-01)
-X( 4) = ( -7.13923827204256E-01, -2.83071164274420E-01)
-
-X( 5) = ( -3.01606850142871E-01,  4.55976262639779E-01)
-
-PATH NUMBER =      4983
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.82797681852204E-01,  6.07832198641509E-01)
-X( 2) = ( -1.04704821192184E+00,  3.90824723109895E-01)
-X( 3) = (  1.64745743287306E+00, -3.08532770129311E-01)
-X( 4) = ( -7.76427820384728E-01, -3.45296549922151E-01)
-
-X( 5) = ( -2.60389050632428E-01,  6.25499403085865E-01)
-
-PATH NUMBER =      4984
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.84833595016821E-01,  2.74893211297404E-01)
-X( 2) = ( -8.89136513149309E-01,  1.85521117890323E-02)
-X( 3) = (  1.33217203525641E+00, -1.78119438015826E-01)
-X( 4) = ( -7.84310950131048E-01, -4.33140753190870E-01)
-
-X( 5) = ( -3.26746471599639E-01,  9.34314156471070E-01)
-
-PATH NUMBER =      4985
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.23841391368725E-02,  1.85384903881774E-02)
-X( 2) = ( -5.28876911818428E-01, -1.65121570043169E-01)
-X( 3) = (  1.00682133439514E+00, -2.80878576744737E-01)
-X( 4) = ( -7.33884612423683E-01, -5.05500495091572E-01)
-
-X( 5) = ( -1.00695891657534E+00,  1.18275649266684E+00)
-
-PATH NUMBER =      4986
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.55143224268713E-01, -4.12807411073739E-02)
-X( 2) = ( -1.34838879231402E-01, -7.42533653518275E-02)
-X( 3) = (  8.23640539092495E-01, -5.68728043264171E-01)
-X( 4) = ( -6.48743851102228E-01, -5.28517848199964E-01)
-
-X( 5) = ( -1.21170341877704E+00,  2.93826333969304E-01)
-
-PATH NUMBER =      4987
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.24184884554263E-01, -1.49118917801812E-01)
-X( 2) = ( -1.05463587448528E-02,  3.09642845920318E-01)
-X( 3) = (  7.11017234199272E-01, -7.32636977368049E-01)
-X( 4) = ( -2.73698056521784E-01, -3.05301616515670E-01)
-
-X( 5) = ( -1.61253422670103E+00, -2.05112516856165E-01)
-
-PATH NUMBER =      4988
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.39969857301748E-01,  1.63045068465017E-01)
-X( 2) = ( -3.16100849369867E-02,  7.13473653546216E-01)
-X( 3) = (  9.62684609240156E-01, -9.63019380088529E-01)
-X( 4) = ( -2.36245850678174E-01, -2.25451256090928E-01)
-
-X( 5) = ( -9.77760065891375E-01,  2.28571877007900E-01)
-
-PATH NUMBER =      4989
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.28011149708964E-01,  4.76601701356568E-01)
-X( 2) = ( -3.07323274889486E-01,  1.00928649747815E+00)
-X( 3) = (  1.30355995736310E+00, -9.77733869046336E-01)
-X( 4) = ( -2.58882618819156E-01, -1.40208517334805E-01)
-
-X( 5) = ( -6.64747171799531E-01,  4.37604204498713E-01)
-
-PATH NUMBER =      4990
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.40695485341010E-01,  6.44834347549078E-01)
-X( 2) = ( -7.08676662812791E-01,  1.05866726044681E+00)
-X( 3) = (  1.57414391477388E+00, -7.69895371324782E-01)
-X( 4) = ( -3.31016365551911E-01, -8.94594250788043E-02)
-
-X( 5) = ( -4.35559583294795E-01,  5.88673079575583E-01)
-
-PATH NUMBER =      4991
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.87538943286423E-01,  5.89025082191475E-01)
-X( 2) = ( -1.04787253795154E+00,  8.38510134653116E-01)
-X( 3) = (  1.64782724059427E+00, -4.36753829875392E-01)
-X( 4) = ( -4.18894909102887E-01, -9.69500436028443E-02)
-
-X( 5) = ( -2.15004772824372E-01,  7.32485289634829E-01)
-
-PATH NUMBER =      4992
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.03107599099225E-01,  3.35287680795474E-01)
-X( 2) = ( -1.16619738058606E+00,  4.51829086029839E-01)
-X( 3) = (  1.49013268777397E+00, -1.34189874398151E-01)
-X( 4) = ( -4.81398902283358E-01, -1.59175429250575E-01)
-
-X( 5) = (  6.06910059572360E-02,  9.10113969223723E-01)
-
-PATH NUMBER =      4993
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.05143512263842E-01,  2.34869345136865E-03)
-X( 2) = ( -1.00828568181353E+00,  7.95564747089769E-02)
-X( 3) = (  1.17484729015732E+00, -3.77654228466609E-03)
-X( 4) = ( -4.89282032029678E-01, -2.47019632519294E-01)
-
-X( 5) = (  5.44467698790692E-01,  1.21614454829176E+00)
-
-PATH NUMBER =      4994
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.92694056383894E-01, -2.54006027457857E-01)
-X( 2) = ( -6.48026080482650E-01, -1.04117207123224E-01)
-X( 3) = (  8.49496589296043E-01, -1.06535681013577E-01)
-X( 4) = ( -4.38855694322313E-01, -3.19379374419996E-01)
-
-X( 5) = (  2.25735327776048E+00,  2.24359746282946E+00)
-
-PATH NUMBER =      4995
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.34833307021692E-01, -3.13825258953409E-01)
-X( 2) = ( -2.53988047895624E-01, -1.32490024318829E-02)
-X( 3) = (  6.66315793993402E-01, -3.94385147533011E-01)
-X( 4) = ( -3.53714933000858E-01, -3.42396727528388E-01)
-
-X( 5) = ( -5.40949962585300E+00, -3.09490033634557E+00)
-
-PATH NUMBER =      4996
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07210380154501E-01, -4.35233855329107E-01)
-X( 2) = ( -1.41032765924087E-01,  2.79787289819342E-01)
-X( 3) = (  4.78434034238141E-01, -7.00208967742712E-01)
-X( 4) = ( -1.67329143519488E-01,  2.69163667766524E-02)
-
-X( 5) = ( -5.14587318707609E-01, -1.22230566780359E+00)
-
-PATH NUMBER =      4997
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.22995352901986E-01, -1.23069869062277E-01)
-X( 2) = ( -1.62096492116221E-01,  6.83618097445239E-01)
-X( 3) = (  7.30101409279024E-01, -9.30591370463193E-01)
-X( 4) = ( -1.29876937675877E-01,  1.06766727201394E-01)
-
-X( 5) = ( -1.12857852483574E+00, -6.76100451995663E-01)
-
-PATH NUMBER =      4998
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.11036645309202E-01,  1.90486763829273E-01)
-X( 2) = ( -4.37809682068720E-01,  9.79430941377173E-01)
-X( 3) = (  1.07097675740197E+00, -9.45305859421000E-01)
-X( 4) = ( -1.52513705816860E-01,  1.92009465957518E-01)
-
-X( 5) = ( -1.35278779610376E+00,  1.35993204418816E-01)
-
-PATH NUMBER =      4999
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.23720980941248E-01,  3.58719410021784E-01)
-X( 2) = ( -8.39163069992025E-01,  1.02881170434584E+00)
-X( 3) = (  1.34156071481275E+00, -7.37467361699446E-01)
-X( 4) = ( -2.24647452549615E-01,  2.42758558213518E-01)
-
-X( 5) = ( -1.04028897779603E+00,  1.01061622450853E+00)
-
-PATH NUMBER =      5000
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.04513447686185E-01,  3.02910144664180E-01)
-X( 2) = ( -1.17835894513077E+00,  8.08654578552139E-01)
-X( 3) = (  1.41524404063314E+00, -4.04325820250055E-01)
-X( 4) = ( -3.12525996100590E-01,  2.35267939689478E-01)
-
-X( 5) = ( -1.24473940536300E-01,  1.55352166502035E+00)
-
-PATH NUMBER =      5001
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.20082103498988E-01,  4.91727432681807E-02)
-X( 2) = ( -1.29668378776530E+00,  4.21973529928863E-01)
-X( 3) = (  1.25754948781284E+00, -1.01761864772814E-01)
-X( 4) = ( -3.75029989281062E-01,  1.73042554041747E-01)
-
-X( 5) = (  1.02875977203275E+00,  1.25505717103596E+00)
-
-PATH NUMBER =      5002
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.22118016663604E-01, -2.83766244075926E-01)
-X( 2) = ( -1.13877208899277E+00,  4.97009186080001E-02)
-X( 3) = (  9.42264090196187E-01,  2.86514673406707E-02)
-X( 4) = ( -3.82913119027382E-01,  8.51983507730284E-02)
-
-X( 5) = (  1.58305867962179E+00,  1.71524317141291E-01)
-
-PATH NUMBER =      5003
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.09668560783656E-01, -5.40120964985152E-01)
-X( 2) = ( -7.78512487661885E-01, -1.33972763224201E-01)
-X( 3) = (  6.16913389334911E-01, -7.41076713882403E-02)
-X( 4) = ( -3.32486781320017E-01,  1.28386088723267E-02)
-
-X( 5) = (  1.20422514759199E+00, -8.81834787924008E-01)
-
-PATH NUMBER =      5004
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.17858802621930E-01, -5.99940196480703E-01)
-X( 2) = ( -3.84474455074859E-01, -4.31045585328596E-02)
-X( 3) = (  4.33732594032271E-01, -3.61957137907674E-01)
-X( 4) = ( -2.47346019998562E-01, -1.01787442360660E-02)
-
-X( 5) = (  3.44672882506493E-01, -1.34647147834311E+00)
-
-PATH NUMBER =      5005
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.54722736485046E-01, -6.01042853455307E-01)
-X( 2) = ( -2.21800371504291E-01,  1.73041561204637E-01)
-X( 3) = (  2.79420643551123E-01, -8.24869270324077E-01)
-X( 4) = ( -2.99391432168828E-01,  3.49782726115632E-01)
-
-X( 5) = ( -2.14277264777180E-01, -6.59173929552825E-01)
-
-PATH NUMBER =      5006
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.70507709232531E-01, -2.88878867188478E-01)
-X( 2) = ( -2.42864097696425E-01,  5.76872368830534E-01)
-X( 3) = (  5.31088018592007E-01, -1.05525167304456E+00)
-X( 4) = ( -2.61939226325217E-01,  4.29633086540373E-01)
-
-X( 5) = ( -4.50277024024973E-01, -5.96871049152625E-01)
-
-PATH NUMBER =      5007
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.58549001639748E-01,  2.46777657030734E-02)
-X( 2) = ( -5.18577287648925E-01,  8.72685212762469E-01)
-X( 3) = (  8.71963366714955E-01, -1.06996616200236E+00)
-X( 4) = ( -2.84575994466200E-01,  5.14875825296497E-01)
-
-X( 5) = ( -7.71166467657594E-01, -5.25756373716115E-01)
-
-PATH NUMBER =      5008
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.71233337271794E-01,  1.92910411895583E-01)
-X( 2) = ( -9.19930675572229E-01,  9.22065975731130E-01)
-X( 3) = (  1.14254732412573E+00, -8.62127664280811E-01)
-X( 4) = ( -3.56709741198955E-01,  5.65624917552497E-01)
-
-X( 5) = ( -1.41307109647363E+00, -4.28896271801433E-01)
-
-PATH NUMBER =      5009
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.42998908644360E-01,  1.37101146537980E-01)
-X( 2) = ( -1.25912655071098E+00,  7.01908849937434E-01)
-X( 3) = (  1.21623064994613E+00, -5.28986122831419E-01)
-X( 4) = ( -4.44588284749931E-01,  5.58134299028457E-01)
-
-X( 5) = ( -4.72665867449887E+00, -8.66362890718574E-01)
-
-PATH NUMBER =      5010
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.25697471684423E-02, -1.16636254858019E-01)
-X( 2) = ( -1.37745139334550E+00,  3.15227801314159E-01)
-X( 3) = (  1.05853609712582E+00, -2.26422167354179E-01)
-X( 4) = ( -5.07092277930402E-01,  4.95908913380727E-01)
-
-X( 5) = (  2.45854260780320E+00, -2.07857549757487E+00)
-
-PATH NUMBER =      5011
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.46056603330589E-02, -4.49575242202126E-01)
-X( 2) = ( -1.21953969457297E+00, -5.70448100067048E-02)
-X( 3) = (  7.43250699509169E-01, -9.60088352406937E-02)
-X( 4) = ( -5.14975407676721E-01,  4.08064710112007E-01)
-
-X( 5) = (  7.93850070215783E-01, -1.02740393983409E+00)
-
-PATH NUMBER =      5012
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.37843795546889E-01, -7.05929963111352E-01)
-X( 2) = ( -8.59280093242089E-01, -2.40718491838906E-01)
-X( 3) = (  4.17899998647894E-01, -1.98767973969605E-01)
-X( 4) = ( -4.64549069969357E-01,  3.35704968211306E-01)
-
-X( 5) = (  2.97529935691884E-01, -8.24669768606621E-01)
-
-PATH NUMBER =      5013
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.65371158952475E-01, -7.65749194606903E-01)
-X( 2) = ( -4.65242060655063E-01, -1.49850287147564E-01)
-X( 3) = (  2.34719203345253E-01, -4.86617440489038E-01)
-X( 4) = ( -3.79408308647902E-01,  3.12687615102913E-01)
-
-X( 5) = (  1.32247977649999E-02, -7.27498173775757E-01)
-
-PATH NUMBER =      5014
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.05090817122540E+00, -5.68962039195413E-01)
-X( 2) = ( -2.15057115202538E-01,  3.93531728416515E-02)
-X( 3) = (  2.07097639428143E-01, -1.04828794408938E+00)
-X( 4) = ( -6.08091509901926E-01,  5.12224703706668E-01)
-
-X( 5) = ( -2.37282114279932E-01, -4.25752033840447E-01)
-
-PATH NUMBER =      5015
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.16669314397289E+00, -2.56798052928584E-01)
-X( 2) = ( -2.36120841394672E-01,  4.43183980467549E-01)
-X( 3) = (  4.58765014469027E-01, -1.27867034680986E+00)
-X( 4) = ( -5.70639304058316E-01,  5.92075064131410E-01)
-
-X( 5) = ( -3.34676273071074E-01, -3.66590832984679E-01)
-
-PATH NUMBER =      5016
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.05473443638011E+00,  5.67585799629665E-02)
-X( 2) = ( -5.11834031347171E-01,  7.38996824399482E-01)
-X( 3) = (  7.99640362591975E-01, -1.29338483576767E+00)
-X( 4) = ( -5.93276072199298E-01,  6.77317802887533E-01)
-
-X( 5) = ( -4.61541087862075E-01, -3.28527861506423E-01)
-
-PATH NUMBER =      5017
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.67418772012151E-01,  2.24991226155477E-01)
-X( 2) = ( -9.13187419270475E-01,  7.88377587368145E-01)
-X( 3) = (  1.07022432000275E+00, -1.08554633804612E+00)
-X( 4) = ( -6.65409818932053E-01,  7.28066895143534E-01)
-
-X( 5) = ( -6.58961567223294E-01, -3.38458630338342E-01)
-
-PATH NUMBER =      5018
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.39184343384718E-01,  1.69181960797873E-01)
-X( 2) = ( -1.25238329440922E+00,  5.68220461574448E-01)
-X( 3) = (  1.14390764582315E+00, -7.52404796596725E-01)
-X( 4) = ( -7.53288362483029E-01,  7.20576276619494E-01)
-
-X( 5) = ( -9.67216001496560E-01, -5.84289476790868E-01)
-
-PATH NUMBER =      5019
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.23615687571915E-01, -8.45554405981261E-02)
-X( 2) = ( -1.37070813704375E+00,  1.81539412951173E-01)
-X( 3) = (  9.86213093002838E-01, -4.49840841119484E-01)
-X( 4) = ( -8.15792355663501E-01,  6.58350890971763E-01)
-
-X( 5) = ( -6.51030935141633E-01, -1.28027408944635E+00)
-
-PATH NUMBER =      5020
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.21579774407299E-01, -4.17494427942232E-01)
-X( 2) = ( -1.21279643827122E+00, -1.90733198369690E-01)
-X( 3) = (  6.70927695386189E-01, -3.19427509005999E-01)
-X( 4) = ( -8.23675485409820E-01,  5.70506687703044E-01)
-
-X( 5) = ( -7.67522177510268E-02, -9.65216176859824E-01)
-
-PATH NUMBER =      5021
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.34029230287247E-01, -6.73849148851459E-01)
-X( 2) = ( -8.52536836940335E-01, -3.74406880201891E-01)
-X( 3) = (  3.45576994524914E-01, -4.22186647734910E-01)
-X( 4) = ( -7.73249147702455E-01,  4.98146945802343E-01)
-
-X( 5) = ( -7.34216350288650E-02, -6.61640127938410E-01)
-
-PATH NUMBER =      5022
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.61556593692833E-01, -7.33668380347010E-01)
-X( 2) = ( -4.58498804353309E-01, -2.83538675510550E-01)
-X( 3) = (  1.62396199222273E-01, -7.10036114254344E-01)
-X( 4) = ( -6.88108386381001E-01,  4.75129592693950E-01)
-
-X( 5) = ( -1.50900918069521E-01, -5.12964756012300E-01)
-
-PATH NUMBER =      5023
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23793644960292E+00, -2.92235102380725E-01)
-X( 2) = (  1.27540355728573E-01, -2.19856067476737E-01)
-X( 3) = (  2.86315883322254E-01, -7.37600385068076E-01)
-X( 4) = ( -9.04659590854933E-01,  1.79808453969063E-01)
-
-X( 5) = ( -4.33821008069227E-01, -1.93388066094038E-01)
-
-PATH NUMBER =      5024
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.35372142235041E+00,  1.99288838861039E-02)
-X( 2) = (  1.06476629536439E-01,  1.83974740149160E-01)
-X( 3) = (  5.37983258363139E-01, -9.67982787788556E-01)
-X( 4) = ( -8.67207385011323E-01,  2.59658814393804E-01)
-
-X( 5) = ( -4.13841872004102E-01, -1.00247680880124E-01)
-
-PATH NUMBER =      5025
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.24176271475762E+00,  3.33485516777655E-01)
-X( 2) = ( -1.69236560416060E-01,  4.79787584081094E-01)
-X( 3) = (  8.78858606486087E-01, -9.82697276746363E-01)
-X( 4) = ( -8.89844153152305E-01,  3.44901553149928E-01)
-
-X( 5) = ( -4.22735697264725E-01, -1.58728781826877E-02)
-
-PATH NUMBER =      5026
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.54447050389669E-01,  5.01718162970164E-01)
-X( 2) = ( -5.70589948339364E-01,  5.29168347049756E-01)
-X( 3) = (  1.14944256389687E+00, -7.74858779024810E-01)
-X( 4) = ( -9.61977899885060E-01,  3.95650645405929E-01)
-
-X( 5) = ( -4.60283109395344E-01,  6.89188648547925E-02)
-
-PATH NUMBER =      5027
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.26212621762236E-01,  4.45908897612561E-01)
-X( 2) = ( -9.09785823478111E-01,  3.09011221256060E-01)
-X( 3) = (  1.22312588971726E+00, -4.41717237575419E-01)
-X( 4) = ( -1.04985644343604E+00,  3.88160026881888E-01)
-
-X( 5) = ( -5.50318448230312E-01,  1.56205905887493E-01)
-
-PATH NUMBER =      5028
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.10643965949433E-01,  1.92171496216562E-01)
-X( 2) = ( -1.02811066611264E+00, -7.76698273672155E-02)
-X( 3) = (  1.06543133689695E+00, -1.39153282098178E-01)
-X( 4) = ( -1.11236043661651E+00,  3.25934641234158E-01)
-
-X( 5) = ( -7.57898454735651E-01,  1.92144801629862E-01)
-
-PATH NUMBER =      5029
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.08608052784817E-01, -1.40767491127545E-01)
-X( 2) = ( -8.70198967340105E-01, -4.49942438688079E-01)
-X( 3) = (  7.50145939280301E-01, -8.73994998469345E-03)
-X( 4) = ( -1.12024356636283E+00,  2.38090437965439E-01)
-
-X( 5) = ( -9.85284795873741E-01, -9.26638413111948E-02)
-
-PATH NUMBER =      5030
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.21057508664765E-01, -3.97122212036771E-01)
-X( 2) = ( -5.09939366009225E-01, -6.33616120520280E-01)
-X( 3) = (  4.24795238419026E-01, -1.11499088713604E-01)
-X( 4) = ( -1.06981722865546E+00,  1.65730696064737E-01)
-
-X( 5) = ( -7.26932179978731E-01, -3.72253327535995E-01)
-
-PATH NUMBER =      5031
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.48584872070351E-01, -4.56941443532322E-01)
-X( 2) = ( -1.15901333422199E-01, -5.42747915828939E-01)
-X( 3) = (  2.41614443116385E-01, -3.99348555233038E-01)
-X( 4) = ( -9.84676467334007E-01,  1.42713342956344E-01)
-
-X( 5) = ( -5.10076781259495E-01, -3.01862012568019E-01)
-
-PATH NUMBER =      5032
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25777507599098E+00,  5.02138501517220E-03)
-X( 2) = (  2.60368671244489E-01, -2.36430001404683E-01)
-X( 3) = (  4.93781567544679E-01, -8.47620885805628E-01)
-X( 4) = ( -1.11823891574521E+00, -9.59940225526681E-02)
-
-X( 5) = ( -4.00991147089752E-01, -6.35906660153997E-02)
-
-PATH NUMBER =      5033
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.37356004873847E+00,  3.17185371282002E-01)
-X( 2) = (  2.39304945052355E-01,  1.67400806221214E-01)
-X( 3) = (  7.45448942585563E-01, -1.07800328852611E+00)
-X( 4) = ( -1.08078670990160E+00, -1.61436621279264E-02)
-
-X( 5) = ( -3.57845660973749E-01, -1.04391854526810E-02)
-
-PATH NUMBER =      5034
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26160134114569E+00,  6.30742004173552E-01)
-X( 2) = ( -3.64082449001444E-02,  4.63213650153149E-01)
-X( 3) = (  1.08632429070851E+00, -1.09271777748392E+00)
-X( 4) = ( -1.10342347804259E+00,  6.90990766281971E-02)
-
-X( 5) = ( -3.42126314506249E-01,  4.55960918405980E-02)
-
-PATH NUMBER =      5035
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.74285676777732E-01,  7.98974650366063E-01)
-X( 2) = ( -4.37761632823449E-01,  5.12594413121811E-01)
-X( 3) = (  1.35690824811929E+00, -8.84879279762362E-01)
-X( 4) = ( -1.17555722477534E+00,  1.19848168884198E-01)
-
-X( 5) = ( -3.48278996325529E-01,  1.04381569461138E-01)
-
-PATH NUMBER =      5036
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.46051248150298E-01,  7.43165385008459E-01)
-X( 2) = ( -7.76957507962196E-01,  2.92437287328114E-01)
-X( 3) = (  1.43059157393968E+00, -5.51737738312971E-01)
-X( 4) = ( -1.26343576832632E+00,  1.12357550360157E-01)
-
-X( 5) = ( -3.84304733488176E-01,  1.66391472107448E-01)
-
-PATH NUMBER =      5037
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.30482592337496E-01,  4.89427983612460E-01)
-X( 2) = ( -8.95282350596722E-01, -9.42437612951617E-02)
-X( 3) = (  1.27289702111937E+00, -2.49173782835730E-01)
-X( 4) = ( -1.32593976150679E+00,  5.01321647124264E-02)
-
-X( 5) = ( -4.75659947695780E-01,  2.13640325658891E-01)
-
-PATH NUMBER =      5038
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.28446679172880E-01,  1.56488996268353E-01)
-X( 2) = ( -7.37370651824189E-01, -4.66516372616024E-01)
-X( 3) = (  9.57611623502726E-01, -1.18760450722246E-01)
-X( 4) = ( -1.33382289125311E+00, -3.77120385562923E-02)
-
-X( 5) = ( -6.21351892695436E-01,  1.54476058919729E-01)
-
-PATH NUMBER =      5039
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.40896135052828E-01, -9.98657246408727E-02)
-X( 2) = ( -3.77111050493309E-01, -6.50190054448226E-01)
-X( 3) = (  6.32260922641451E-01, -2.21519589451156E-01)
-X( 4) = ( -1.28339655354574E+00, -1.10071780456994E-01)
-
-X( 5) = ( -6.23356954721850E-01, -3.37718369483978E-02)
-
-PATH NUMBER =      5040
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.68423498458414E-01, -1.59684956136424E-01)
-X( 2) = (  1.69269820937173E-02, -5.59321849756884E-01)
-X( 3) = (  4.49080127338810E-01, -5.09369055970590E-01)
-X( 4) = ( -1.19825579222429E+00, -1.33089133565387E-01)
-
-X( 5) = ( -4.90598928067608E-01, -9.69952944279370E-02)
-
-PATH NUMBER =      5041
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08189955849765E+00,  2.45485088601314E-01)
-X( 2) = (  3.72774583606958E-01, -1.63745975961642E-01)
-X( 3) = (  7.23429316766753E-01, -7.98545107771483E-01)
-X( 4) = ( -1.10456775611348E+00, -4.44557120815282E-01)
-
-X( 5) = ( -3.91165025377363E-01,  4.70289387228781E-02)
-
-PATH NUMBER =      5042
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.19768453124513E+00,  5.57649074868143E-01)
-X( 2) = (  3.51710857414823E-01,  2.40084831664255E-01)
-X( 3) = (  9.75096691807636E-01, -1.02892751049196E+00)
-X( 4) = ( -1.06711555026987E+00, -3.64706760390539E-01)
-
-X( 5) = ( -3.32490541432253E-01,  7.01237195391423E-02)
-
-PATH NUMBER =      5043
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08572582365235E+00,  8.71205707759694E-01)
-X( 2) = (  7.59976674623241E-02,  5.35897675596190E-01)
-X( 3) = (  1.31597203993058E+00, -1.04364199944977E+00)
-X( 4) = ( -1.08975231841086E+00, -2.79464021634416E-01)
-
-X( 5) = ( -2.98752315418962E-01,  1.08172537220315E-01)
-
-PATH NUMBER =      5044
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.98410159284395E-01,  1.03943835395220E+00)
-X( 2) = ( -3.25355720460980E-01,  5.85278438564852E-01)
-X( 3) = (  1.58655599734136E+00, -8.35803501728216E-01)
-X( 4) = ( -1.16188606514361E+00, -2.28714929378415E-01)
-
-X( 5) = ( -2.83693423119809E-01,  1.54078603071907E-01)
-
-PATH NUMBER =      5045
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.70175730656962E-01,  9.83629088594600E-01)
-X( 2) = ( -6.64551595599727E-01,  3.65121312771155E-01)
-X( 3) = (  1.66023932316175E+00, -5.02661960278825E-01)
-X( 4) = ( -1.24976460869459E+00, -2.36205547902455E-01)
-
-X( 5) = ( -2.89396378846175E-01,  2.07965611902158E-01)
-
-PATH NUMBER =      5046
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.54607074844159E-01,  7.29891687198601E-01)
-X( 2) = ( -7.82876438234254E-01, -2.15597358521206E-02)
-X( 3) = (  1.50254477034145E+00, -2.00098004801585E-01)
-X( 4) = ( -1.31226860187506E+00, -2.98430933550186E-01)
-
-X( 5) = ( -3.31073634791538E-01,  2.65768008757944E-01)
-
-PATH NUMBER =      5047
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.52571161679543E-01,  3.96952699854494E-01)
-X( 2) = ( -6.24964739461721E-01, -3.93832347172983E-01)
-X( 3) = (  1.18725937272480E+00, -6.96846726881003E-02)
-X( 4) = ( -1.32015173162138E+00, -3.86275136818904E-01)
-
-X( 5) = ( -4.32638855695955E-01,  2.87574038368647E-01)
-
-PATH NUMBER =      5048
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.65020617559491E-01,  1.40597978945269E-01)
-X( 2) = ( -2.64705138130840E-01, -5.77506029005185E-01)
-X( 3) = (  8.61908671863523E-01, -1.72443811417011E-01)
-X( 4) = ( -1.26972539391401E+00, -4.58634878719607E-01)
-
-X( 5) = ( -5.25811766204187E-01,  1.87673799673614E-01)
-
-PATH NUMBER =      5049
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.92547980965077E-01,  8.07787474497177E-02)
-X( 2) = (  1.29332894456186E-01, -4.86637824313843E-01)
-X( 3) = (  6.78727876560883E-01, -4.60293277936445E-01)
-X( 4) = ( -1.18458463259256E+00, -4.81652231828000E-01)
-
-X( 5) = ( -4.77728870884345E-01,  7.01594246172596E-02)
-
-PATH NUMBER =      5050
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.92604006396694E-01,  3.16640369013362E-01)
-X( 2) = (  4.12162117169018E-01, -3.58136544453764E-02)
-X( 3) = (  8.67804396877026E-01, -6.13336152924335E-01)
-X( 4) = ( -8.70042999489447E-01, -7.02784293294368E-01)
-
-X( 5) = ( -3.98248321310131E-01,  1.64698150764809E-01)
-
-PATH NUMBER =      5051
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.08388979144179E-01,  6.28804355280191E-01)
-X( 2) = (  3.91098390976883E-01,  3.68017153180521E-01)
-X( 3) = (  1.11947177191791E+00, -8.43718555644815E-01)
-X( 4) = ( -8.32590793645837E-01, -6.22933932869626E-01)
-
-X( 5) = ( -3.25692091936252E-01,  1.54940425756150E-01)
-
-PATH NUMBER =      5052
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.96430271551395E-01,  9.42360988171742E-01)
-X( 2) = (  1.15385201024384E-01,  6.63829997112455E-01)
-X( 3) = (  1.46034712004086E+00, -8.58433044602622E-01)
-X( 4) = ( -8.55227561786819E-01, -5.37691194113502E-01)
-
-X( 5) = ( -2.74417329753836E-01,  1.75823575688816E-01)
-
-PATH NUMBER =      5053
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.09114607183441E-01,  1.11059363436425E+00)
-X( 2) = ( -2.85968186898920E-01,  7.13210760081117E-01)
-X( 3) = (  1.73093107745164E+00, -6.50594546881069E-01)
-X( 4) = ( -9.27361308519574E-01, -4.86942101857502E-01)
-
-X( 5) = ( -2.40458696194935E-01,  2.11345201824442E-01)
-
-PATH NUMBER =      5054
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.80880178556008E-01,  1.05478436900665E+00)
-X( 2) = ( -6.25164062037667E-01,  4.93053634287421E-01)
-X( 3) = (  1.80461440327203E+00, -3.17453005431678E-01)
-X( 4) = ( -1.01523985207055E+00, -4.94432720381542E-01)
-
-X( 5) = ( -2.22424378045249E-01,  2.59638440630374E-01)
-
-PATH NUMBER =      5055
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.46884772567944E-02,  8.01046967610649E-01)
-X( 2) = ( -7.43488904672194E-01,  1.06372585664145E-01)
-X( 3) = (  1.64691985045172E+00, -1.48890499544372E-02)
-X( 4) = ( -1.07774384525102E+00, -5.56658106029273E-01)
-
-X( 5) = ( -2.29318796485786E-01,  3.23059850862560E-01)
-
-PATH NUMBER =      5056
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.67243904214103E-02,  4.68107980266542E-01)
-X( 2) = ( -5.85577205899661E-01, -2.65900025656718E-01)
-X( 3) = (  1.33163445283507E+00,  1.15524282159047E-01)
-X( 4) = ( -1.08562697499734E+00, -6.44502309297991E-01)
-
-X( 5) = ( -2.90369903031186E-01,  3.90219760057537E-01)
-
-PATH NUMBER =      5057
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.75725065458538E-01,  2.11753259357316E-01)
-X( 2) = ( -2.25317604568780E-01, -4.49573707488919E-01)
-X( 3) = (  1.00628375197380E+00,  1.27651434301363E-02)
-X( 4) = ( -1.03520063728998E+00, -7.16862051198693E-01)
-
-X( 5) = ( -4.19506536761412E-01,  3.79432074017548E-01)
-
-PATH NUMBER =      5058
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.03252428864123E-01,  1.51934027861765E-01)
-X( 2) = (  1.68720428018246E-01, -3.58705502797578E-01)
-X( 3) = (  8.23102956671156E-01, -2.75084323089297E-01)
-X( 4) = ( -9.50059875968522E-01, -7.39879404307086E-01)
-
-X( 5) = ( -4.67059973403463E-01,  2.46951710574315E-01)
-
-PATH NUMBER =      5059
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.25253023678086E-01,  1.85192879743664E-01)
-X( 2) = (  3.60101407233306E-01,  8.75060080972744E-02)
-X( 3) = (  8.59352103341618E-01, -3.78655349605419E-01)
-X( 4) = ( -5.24401385949826E-01, -7.49848176111616E-01)
-
-X( 5) = ( -4.37273455200788E-01,  3.22518029200199E-01)
-
-PATH NUMBER =      5060
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.41037996425571E-01,  4.97356866010493E-01)
-X( 2) = (  3.39037681041171E-01,  4.91336815723172E-01)
-X( 3) = (  1.11101947838250E+00, -6.09037752325899E-01)
-X( 4) = ( -4.86949180106216E-01, -6.69997815686874E-01)
-
-X( 5) = ( -3.44759308055829E-01,  2.61621917788729E-01)
-
-PATH NUMBER =      5061
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.29079288832787E-01,  8.10913498902043E-01)
-X( 2) = (  6.33244910886721E-02,  7.87149659655106E-01)
-X( 3) = (  1.45189482650545E+00, -6.23752241283706E-01)
-X( 4) = ( -5.09585948247198E-01, -5.84755076930750E-01)
-
-X( 5) = ( -2.68544922408114E-01,  2.60234721163296E-01)
-
-PATH NUMBER =      5062
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.41763624464833E-01,  9.79146145094554E-01)
-X( 2) = ( -3.38028896834632E-01,  8.36530422623768E-01)
-X( 3) = (  1.72247878391623E+00, -4.15913743562152E-01)
-X( 4) = ( -5.81719694979954E-01, -5.34005984674749E-01)
-
-X( 5) = ( -2.11024033822739E-01,  2.84334118444438E-01)
-
-PATH NUMBER =      5063
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.64708041626000E-02,  9.23336879736949E-01)
-X( 2) = ( -6.77224771973379E-01,  6.16373296830071E-01)
-X( 3) = (  1.79616210973662E+00, -8.27722021127609E-02)
-X( 4) = ( -6.69598238530929E-01, -5.41496603198790E-01)
-
-X( 5) = ( -1.66924439710029E-01,  3.26759993414922E-01)
-
-PATH NUMBER =      5064
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.02039459975402E-01,  6.69599478340950E-01)
-X( 2) = ( -7.95549614607906E-01,  2.29692248206796E-01)
-X( 3) = (  1.63846755691631E+00,  2.19791753364479E-01)
-X( 4) = ( -7.32102231711401E-01, -6.03721988846521E-01)
-
-X( 5) = ( -1.38475955650301E-01,  3.92896421921463E-01)
-
-PATH NUMBER =      5065
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.04075373140019E-01,  3.36660490996844E-01)
-X( 2) = ( -6.37637915835373E-01, -1.42580363114067E-01)
-X( 3) = (  1.32318215929966E+00,  3.50205085477964E-01)
-X( 4) = ( -7.39985361457720E-01, -6.91566192115239E-01)
-
-X( 5) = ( -1.50075856197823E-01,  4.93423953530282E-01)
-
-PATH NUMBER =      5066
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.16259172600706E-02,  8.03057700876184E-02)
-X( 2) = ( -2.77378314504492E-01, -3.26254044946268E-01)
-X( 3) = (  9.97831458438389E-01,  2.47445946749053E-01)
-X( 4) = ( -6.89559023750355E-01, -7.63925934015941E-01)
-
-X( 5) = ( -2.75008685225239E-01,  5.90548793827042E-01)
-
-PATH NUMBER =      5067
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.35901446145515E-01,  2.04865385920672E-02)
-X( 2) = (  1.16659718082534E-01, -2.35385840254927E-01)
-X( 3) = (  8.14650663135749E-01, -4.04035197703806E-02)
-X( 4) = ( -6.04418262428901E-01, -7.86943287124334E-01)
-
-X( 5) = ( -4.57215771073687E-01,  4.93532226957301E-01)
-
-PATH NUMBER =      5068
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.04943106431064E-01, -8.73516381023714E-02)
-X( 2) = (  2.40952238569083E-01,  1.48510371017219E-01)
-X( 3) = (  7.02027358242525E-01, -2.04312453874258E-01)
-X( 4) = ( -2.29372467848457E-01, -5.63727055440040E-01)
-
-X( 5) = ( -6.06847379007797E-01,  5.94424730188218E-01)
-
-PATH NUMBER =      5069
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.20728079178549E-01,  2.24812348164458E-01)
-X( 2) = (  2.19888512376949E-01,  5.52341178643116E-01)
-X( 3) = (  9.53694733283409E-01, -4.34694856594739E-01)
-X( 4) = ( -1.91920262004846E-01, -4.83876695015298E-01)
-
-X( 5) = ( -4.42375874362172E-01,  4.15705997591447E-01)
-
-PATH NUMBER =      5070
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.08769371585766E-01,  5.38368981056008E-01)
-X( 2) = ( -5.58246775755498E-02,  8.48154022575050E-01)
-X( 3) = (  1.29457008140636E+00, -4.49409345552545E-01)
-X( 4) = ( -2.14557030145829E-01, -3.98633956259174E-01)
-
-X( 5) = ( -3.06690245645279E-01,  3.81448137602671E-01)
-
-PATH NUMBER =      5071
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.21453707217812E-01,  7.06601627248519E-01)
-X( 2) = ( -4.57178065498854E-01,  8.97534785543713E-01)
-X( 3) = (  1.56515403881714E+00, -2.41570847830993E-01)
-X( 4) = ( -2.86690776878584E-01, -3.47884864003173E-01)
-
-X( 5) = ( -2.05129429493646E-01,  3.93200178268755E-01)
-
-PATH NUMBER =      5072
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.06780721409621E-01,  6.50792361890915E-01)
-X( 2) = ( -7.96373940637601E-01,  6.77377659750016E-01)
-X( 3) = (  1.63883736463753E+00,  9.15706936183987E-02)
-X( 4) = ( -3.74569320429559E-01, -3.55375482527213E-01)
-
-X( 5) = ( -1.19502346895346E-01,  4.30126114527079E-01)
-
-PATH NUMBER =      5073
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.22349377222424E-01,  3.97054960494916E-01)
-X( 2) = ( -9.14698783272128E-01,  2.90696611126741E-01)
-X( 3) = (  1.48114281181722E+00,  3.94134649095639E-01)
-X( 4) = ( -4.37073313610031E-01, -4.17600868174944E-01)
-
-X( 5) = ( -3.93793926467134E-02,  4.98069645488859E-01)
-
-PATH NUMBER =      5074
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.24385290387040E-01,  6.41159731508091E-02)
-X( 2) = ( -7.56787084499595E-01, -8.15760001941228E-02)
-X( 3) = (  1.16585741420057E+00,  5.24547981209124E-01)
-X( 4) = ( -4.44956443356350E-01, -5.05445071443663E-01)
-
-X( 5) = (  3.01164535976132E-02,  6.28933095831191E-01)
-
-PATH NUMBER =      5075
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.11935834507092E-01, -1.92238747758417E-01)
-X( 2) = ( -3.96527483168714E-01, -2.65249682026324E-01)
-X( 3) = (  8.40506713339296E-01,  4.21788842480213E-01)
-X( 4) = ( -3.94530105648986E-01, -5.77804813344365E-01)
-
-X( 5) = ( -6.22510273732927E-03,  8.90528526664034E-01)
-
-PATH NUMBER =      5076
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15591528898494E-01, -2.52057979253968E-01)
-X( 2) = ( -2.48945058168837E-03, -1.74381477334982E-01)
-X( 3) = (  6.57325918036656E-01,  1.33939375960780E-01)
-X( 4) = ( -3.09389344327531E-01, -6.00822166452758E-01)
-
-X( 5) = ( -4.55594243532801E-01,  1.01185767830860E+00)
-
-PATH NUMBER =      5077
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.87968602031303E-01, -3.73466575629666E-01)
-X( 2) = (  1.10465831389849E-01,  1.18654814916242E-01)
-X( 3) = (  4.69444158281394E-01, -1.71884444248922E-01)
-X( 4) = ( -1.23003554846161E-01, -2.31509072147717E-01)
-
-X( 5) = ( -1.65369118152656E+00,  6.52363079698547E-01)
-
-PATH NUMBER =      5078
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.03753574778788E-01, -6.13025893628362E-02)
-X( 2) = (  8.94021051977148E-02,  5.22485622542140E-01)
-X( 3) = (  7.21111533322278E-01, -4.02266846969402E-01)
-X( 4) = ( -8.55513490025502E-02, -1.51658711722975E-01)
-
-X( 5) = ( -8.48701567372478E-01,  4.91047006279598E-01)
-
-PATH NUMBER =      5079
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.91794867186004E-01,  2.52254043528714E-01)
-X( 2) = ( -1.86311084754784E-01,  8.18298466474074E-01)
-X( 3) = (  1.06198688144523E+00, -4.16981335927209E-01)
-X( 4) = ( -1.08188117143533E-01, -6.64159729668517E-02)
-
-X( 5) = ( -5.12805704148276E-01,  5.19426956737341E-01)
-
-PATH NUMBER =      5080
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.04479202818050E-01,  4.20486689721225E-01)
-X( 2) = ( -5.87664472678089E-01,  8.67679229442736E-01)
-X( 3) = (  1.33257083885601E+00, -2.09142838205655E-01)
-X( 4) = ( -1.80321863876288E-01, -1.56668807108510E-02)
-
-X( 5) = ( -2.97793447053540E-01,  5.67390126244414E-01)
-
-PATH NUMBER =      5081
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.23755225809383E-01,  3.64677424363621E-01)
-X( 2) = ( -9.26860347816836E-01,  6.47522103649039E-01)
-X( 3) = (  1.40625416467640E+00,  1.23998703243736E-01)
-X( 4) = ( -2.68200407427263E-01, -2.31574992348913E-02)
-
-X( 5) = ( -1.14889022857032E-01,  6.27919960269946E-01)
-
-PATH NUMBER =      5082
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.39323881622185E-01,  1.10940022967622E-01)
-X( 2) = ( -1.04518519045136E+00,  2.60841055025764E-01)
-X( 3) = (  1.24855961185609E+00,  4.26562658720976E-01)
-X( 4) = ( -3.30704400607735E-01, -8.53828848826222E-02)
-
-X( 5) = (  8.31145932955398E-02,  7.16068211465745E-01)
-
-PATH NUMBER =      5083
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.41359794786802E-01, -2.21998964376485E-01)
-X( 2) = ( -8.87273491678830E-01, -1.11431556295099E-01)
-X( 3) = (  9.33274214239440E-01,  5.56975990834461E-01)
-X( 4) = ( -3.38587530354054E-01, -1.73227088151341E-01)
-
-X( 5) = (  3.59838579496458E-01,  8.85780609718829E-01)
-
-PATH NUMBER =      5084
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.28910338906854E-01, -4.78353685285711E-01)
-X( 2) = ( -5.27013890347949E-01, -2.95105238127300E-01)
-X( 3) = (  6.07923513378165E-01,  4.54216852105550E-01)
-X( 4) = ( -2.88161192646690E-01, -2.45586830052043E-01)
-
-X( 5) = (  8.81292109118103E-01,  1.43792261784437E+00)
-
-PATH NUMBER =      5085
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.98617024498732E-01, -5.38172916781262E-01)
-X( 2) = ( -1.32975857760923E-01, -2.04237033435959E-01)
-X( 3) = (  4.24742718075524E-01,  1.66367385586116E-01)
-X( 4) = ( -2.03020431325235E-01, -2.68604183160435E-01)
-
-X( 5) = ( -1.17480795766170E+00,  4.59254821779029E+00)
-
-PATH NUMBER =      5086
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.35480958361847E-01, -5.39275573755866E-01)
-X( 2) = (  2.96982258096447E-02,  1.19090863015374E-02)
-X( 3) = (  2.70430767594376E-01, -2.96544746830286E-01)
-X( 4) = ( -2.55065843495500E-01,  9.13572871912620E-02)
-
-X( 5) = ( -9.95918964609121E-01, -6.92702108388337E-01)
-
-PATH NUMBER =      5087
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.51265931109333E-01, -2.27111587489037E-01)
-X( 2) = (  8.63449961751096E-03,  4.15739893927435E-01)
-X( 3) = (  5.22098142635260E-01, -5.26927149550766E-01)
-X( 4) = ( -2.17613637651890E-01,  1.71207647616004E-01)
-
-X( 5) = ( -9.40814910431988E-01, -1.51045951456816E-01)
-
-PATH NUMBER =      5088
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.39307223516549E-01,  8.64450454025141E-02)
-X( 2) = ( -2.67078690334988E-01,  7.11552737859369E-01)
-X( 3) = (  8.62973490758208E-01, -5.41641638508573E-01)
-X( 4) = ( -2.40250405792872E-01,  2.56450386372127E-01)
-
-X( 5) = ( -8.36503802463627E-01,  2.23252906315147E-01)
-
-PATH NUMBER =      5089
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.51991559148595E-01,  2.54677691595025E-01)
-X( 2) = ( -6.68432078258293E-01,  7.60933500828031E-01)
-X( 3) = (  1.13355744816899E+00, -3.33803140787020E-01)
-X( 4) = ( -3.12384152525628E-01,  3.07199478628128E-01)
-
-X( 5) = ( -6.92590190962926E-01,  5.55455927254038E-01)
-
-PATH NUMBER =      5090
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23757130521162E-01,  1.98868426237421E-01)
-X( 2) = ( -1.00762795339704E+00,  5.40776375034335E-01)
-X( 3) = (  1.20724077398938E+00, -6.61599337628934E-04)
-X( 4) = ( -4.00262696076603E-01,  2.99708860104088E-01)
-
-X( 5) = ( -4.65249547458669E-01,  9.23104784252723E-01)
-
-PATH NUMBER =      5091
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.18115252916404E-02, -5.48689751585787E-02)
-X( 2) = ( -1.12595279603157E+00,  1.54095326411059E-01)
-X( 3) = (  1.04954622116907E+00,  3.01902356139612E-01)
-X( 4) = ( -4.62766689257075E-01,  2.37483474456357E-01)
-
-X( 5) = (  1.32267028995385E-02,  1.42673681056561E+00)
-
-PATH NUMBER =      5092
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.38474384562569E-02, -3.87807962502685E-01)
-X( 2) = ( -9.68041097259034E-01, -2.18177284909804E-01)
-X( 3) = (  7.34260823552423E-01,  4.32315688253096E-01)
-X( 4) = ( -4.70649819003394E-01,  1.49639271187638E-01)
-
-X( 5) = (  1.68077219124037E+00,  2.04253875379691E+00)
-
-PATH NUMBER =      5093
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18602017423691E-01, -6.44162683411911E-01)
-X( 2) = ( -6.07781495928153E-01, -4.01850966742005E-01)
-X( 3) = (  4.08910122691147E-01,  3.29556549524186E-01)
-X( 4) = ( -4.20223481296029E-01,  7.72795292869365E-02)
-
-X( 5) = (  2.90191715363246E+00, -3.18323967161403E+00)
-
-PATH NUMBER =      5094
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.46129380829277E-01, -7.03981914907462E-01)
-X( 2) = ( -2.13743463341127E-01, -3.10982762050664E-01)
-X( 3) = (  2.25729327388507E-01,  4.17070830047521E-02)
-X( 4) = ( -3.35082719974575E-01,  5.42621761785436E-02)
-
-X( 5) = ( -7.73959022439948E-01, -1.77852332924055E+00)
-
-PATH NUMBER =      5095
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03166639310221E+00, -5.07194759495972E-01)
-X( 2) = (  3.64414821113984E-02, -1.21779302061448E-01)
-X( 3) = (  1.98107763471396E-01, -5.19963420595592E-01)
-X( 4) = ( -5.63765921228599E-01,  2.53799264782299E-01)
-
-X( 5) = ( -5.33380979022740E-01, -3.86424924758954E-01)
-
-PATH NUMBER =      5096
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14745136584969E+00, -1.95030773229143E-01)
-X( 2) = (  1.53777559192645E-02,  2.82051505564449E-01)
-X( 3) = (  4.49775138512280E-01, -7.50345823316072E-01)
-X( 4) = ( -5.26313715384989E-01,  3.33649625207041E-01)
-
-X( 5) = ( -5.53891820676825E-01, -2.04417946450234E-01)
-
-PATH NUMBER =      5097
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03549265825691E+00,  1.18525859662408E-01)
-X( 2) = ( -2.60335434033235E-01,  5.77864349496384E-01)
-X( 3) = (  7.90650486635229E-01, -7.65060312273879E-01)
-X( 4) = ( -5.48950483525971E-01,  4.18892363963164E-01)
-
-X( 5) = ( -5.96054947740914E-01, -4.36586105224335E-02)
-
-PATH NUMBER =      5098
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.48176993888954E-01,  2.86758505854918E-01)
-X( 2) = ( -6.61688821956539E-01,  6.27245112465046E-01)
-X( 3) = (  1.06123444404601E+00, -5.57221814552326E-01)
-X( 4) = ( -6.21084230258726E-01,  4.69641456219165E-01)
-
-X( 5) = ( -6.72013608238353E-01,  1.33625287242081E-01)
-
-PATH NUMBER =      5099
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.19942565261520E-01,  2.30949240497315E-01)
-X( 2) = ( -1.00088469709529E+00,  4.07087986671349E-01)
-X( 3) = (  1.13491776986640E+00, -2.24080273102935E-01)
-X( 4) = ( -7.08962773809702E-01,  4.62150837695125E-01)
-
-X( 5) = ( -8.42116115459274E-01,  3.78200414188854E-01)
-
-PATH NUMBER =      5100
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.04373909448717E-01, -2.27881608986849E-02)
-X( 2) = ( -1.11920953972981E+00,  2.04069380480734E-02)
-X( 3) = (  9.77223217046092E-01,  7.84836823743063E-02)
-X( 4) = ( -7.71466766990174E-01,  3.99925452047394E-01)
-
-X( 5) = ( -1.44802807677027E+00,  7.44242467110396E-01)
-
-PATH NUMBER =      5101
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.02337996284101E-01, -3.55727148242792E-01)
-X( 2) = ( -9.61297840957280E-01, -3.51865673272790E-01)
-X( 3) = (  6.61937819429443E-01,  2.08897014487791E-01)
-X( 4) = ( -7.79349896736493E-01,  3.12081248778675E-01)
-
-X( 5) = ( -2.73892840661591E+00, -1.12291844583499E+00)
-
-PATH NUMBER =      5102
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14787452164049E-01, -6.12081869152017E-01)
-X( 2) = ( -6.01038239626399E-01, -5.35539355104991E-01)
-X( 3) = (  3.36587118568167E-01,  1.06137875758880E-01)
-X( 4) = ( -7.28923559029128E-01,  2.39721506877973E-01)
-
-X( 5) = ( -7.81591949273427E-01, -1.16659376882348E+00)
-
-PATH NUMBER =      5103
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.42314815569635E-01, -6.71901100647569E-01)
-X( 2) = ( -2.07000207039373E-01, -4.44671150413649E-01)
-X( 3) = (  1.53406323265527E-01, -1.81711590760554E-01)
-X( 4) = ( -6.43782797707673E-01,  2.16704153769580E-01)
-
-X( 5) = ( -5.52671835105521E-01, -6.50528649897117E-01)
-
-PATH NUMBER =      5104
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.68254527315135E-01, -2.05944092271524E-02)
-X( 2) = (  1.06574638355558E-01, -5.22579545063482E-01)
-X( 3) = (  2.54469387740667E-01,  8.90144530246672E-03)
-X( 4) = ( -6.11363192208953E-01, -2.74706645786321E-01)
-
-X( 5) = ( -5.89962588158554E-01,  1.21546436771191E-01)
-
-PATH NUMBER =      5105
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.08403950006262E+00,  2.91569577039677E-01)
-X( 2) = (  8.55109121634237E-02, -1.18748737437585E-01)
-X( 3) = (  5.06136762781551E-01, -2.21480957418014E-01)
-X( 4) = ( -5.73910986365342E-01, -1.94856285361580E-01)
-
-X( 5) = ( -4.56340339676675E-01,  1.46940184902385E-01)
-
-PATH NUMBER =      5106
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.72080792469836E-01,  6.05126209931228E-01)
-X( 2) = ( -1.90202277789075E-01,  1.77064106494349E-01)
-X( 3) = (  8.47012110904499E-01, -2.36195446375820E-01)
-X( 4) = ( -5.96547754506324E-01, -1.09613546605456E-01)
-
-X( 5) = ( -3.76663547783340E-01,  2.01261254977116E-01)
-
-PATH NUMBER =      5107
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.84765128101882E-01,  7.73358856123737E-01)
-X( 2) = ( -5.91555665712379E-01,  2.26444869463010E-01)
-X( 3) = (  1.11759606831528E+00, -2.83569486542666E-02)
-X( 4) = ( -6.68681501239079E-01, -5.88644543494556E-02)
-
-X( 5) = ( -3.25103320092241E-01,  2.68620457104761E-01)
-
-PATH NUMBER =      5108
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.56530699474448E-01,  7.17549590766134E-01)
-X( 2) = ( -9.30751540851126E-01,  6.28774366931366E-03)
-X( 3) = (  1.19127939413567E+00,  3.04784592795125E-01)
-X( 4) = ( -7.56560044790054E-01, -6.63550728734957E-02)
-
-X( 5) = ( -2.94317780595240E-01,  3.54866425333449E-01)
-
-PATH NUMBER =      5109
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.40962043661646E-01,  4.63812189370134E-01)
-X( 2) = ( -1.04907638348565E+00, -3.80393304953962E-01)
-X( 3) = (  1.03358484131536E+00,  6.07348548272366E-01)
-X( 4) = ( -8.19064037970527E-01, -1.28580458521226E-01)
-
-X( 5) = ( -2.98497112883742E-01,  4.76979674226450E-01)
-
-PATH NUMBER =      5110
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.38926130497030E-01,  1.30873202026028E-01)
-X( 2) = ( -8.91164684713120E-01, -7.52665916274824E-01)
-X( 3) = (  7.18299443698712E-01,  7.37761880385850E-01)
-X( 4) = ( -8.26947167716846E-01, -2.16424661789945E-01)
-
-X( 5) = ( -4.15267967528406E-01,  6.42807397111086E-01)
-
-PATH NUMBER =      5111
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.51375586376978E-01, -1.25481518883198E-01)
-X( 2) = ( -5.30905083382240E-01, -9.36339598107025E-01)
-X( 3) = (  3.92948742837438E-01,  6.35002741656939E-01)
-X( 4) = ( -7.76520830009481E-01, -2.88784403690647E-01)
-
-X( 5) = ( -7.69216635610816E-01,  6.15186545086407E-01)
-
-PATH NUMBER =      5112
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.78902949782564E-01, -1.85300750378749E-01)
-X( 2) = ( -1.36867050795214E-01, -8.45471393415684E-01)
-X( 3) = (  2.09767947534797E-01,  3.47153275137505E-01)
-X( 4) = ( -6.91380068688027E-01, -3.11801756799040E-01)
-
-X( 5) = ( -7.99371575065268E-01,  2.30424931147180E-01)
-
-PATH NUMBER =      5113
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.88093153703198E-01,  2.76662078168745E-01)
-X( 2) = (  2.39402953871473E-01, -5.39153478991429E-01)
-X( 3) = (  4.61935071963092E-01, -1.01119055435085E-01)
-X( 4) = ( -8.24942517099233E-01, -5.50509122308052E-01)
-
-X( 5) = ( -4.09803917285997E-01,  1.54742760209210E-01)
-
-PATH NUMBER =      5114
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10387812645068E+00,  5.88826064435575E-01)
-X( 2) = (  2.18339227679339E-01, -1.35322671365531E-01)
-X( 3) = (  7.13602447003976E-01, -3.31501458155565E-01)
-X( 4) = ( -7.87490311255622E-01, -4.70658761883311E-01)
-
-X( 5) = ( -3.34489010827909E-01,  1.48903194368087E-01)
-
-PATH NUMBER =      5115
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.91919418857899E-01,  9.02382697327125E-01)
-X( 2) = ( -5.73739622731600E-02,  1.60490172566402E-01)
-X( 3) = (  1.05447779512692E+00, -3.46215947113372E-01)
-X( 4) = ( -8.10127079396605E-01, -3.85416023127187E-01)
-
-X( 5) = ( -2.82625486827788E-01,  1.72868520088940E-01)
-
-PATH NUMBER =      5116
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.04603754489945E-01,  1.07061534351963E+00)
-X( 2) = ( -4.58727350196464E-01,  2.09870935535064E-01)
-X( 3) = (  1.32506175253770E+00, -1.38377449391819E-01)
-X( 4) = ( -8.82260826129360E-01, -3.34666930871186E-01)
-
-X( 5) = ( -2.48891804720728E-01,  2.11007051636931E-01)
-
-PATH NUMBER =      5117
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.76369325862511E-01,  1.01480607816203E+00)
-X( 2) = ( -7.97923225335211E-01, -1.02861902586326E-02)
-X( 3) = (  1.39874507835809E+00,  1.94764092057574E-01)
-X( 4) = ( -9.70139369680335E-01, -3.42157549395227E-01)
-
-X( 5) = ( -2.31799405755564E-01,  2.61977929014536E-01)
-
-PATH NUMBER =      5118
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.60800670049709E-01,  7.61068676766032E-01)
-X( 2) = ( -9.16248067969738E-01, -3.96967238881908E-01)
-X( 3) = (  1.24105052553779E+00,  4.97328047534814E-01)
-X( 4) = ( -1.03264336286081E+00, -4.04382935042957E-01)
-
-X( 5) = ( -2.41193715221049E-01,  3.28456742089864E-01)
-
-PATH NUMBER =      5119
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.58764756885093E-01,  4.28129689421926E-01)
-X( 2) = ( -7.58336369197204E-01, -7.69239850202770E-01)
-X( 3) = (  9.25765127921138E-01,  6.27741379648298E-01)
-X( 4) = ( -1.04052649260713E+00, -4.92227138311676E-01)
-
-X( 5) = ( -3.08760195212955E-01,  3.97504000152908E-01)
-
-PATH NUMBER =      5120
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.71214212765041E-01,  1.71774968512700E-01)
-X( 2) = ( -3.98076767866324E-01, -9.52913532034971E-01)
-X( 3) = (  6.00414427059863E-01,  5.24982240919387E-01)
-X( 4) = ( -9.90100154899762E-01, -5.64586880212377E-01)
-
-X( 5) = ( -4.46247709520943E-01,  3.78755909801216E-01)
-
-PATH NUMBER =      5121
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.98741576170627E-01,  1.11955737017149E-01)
-X( 2) = ( -4.03873527929823E-03, -8.62045327343630E-01)
-X( 3) = (  4.17233631757223E-01,  2.37132774399953E-01)
-X( 4) = ( -9.04959393578307E-01, -5.87604233320771E-01)
-
-X( 5) = ( -4.87005810254545E-01,  2.35322887771843E-01)
-
-PATH NUMBER =      5122
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.12217636209860E-01,  5.17125781754887E-01)
-X( 2) = (  3.51808866233942E-01, -4.66469453548388E-01)
-X( 3) = (  6.91582821185165E-01, -5.20432774009389E-02)
-X( 4) = ( -8.11271357467503E-01, -8.99072220570665E-01)
-
-X( 5) = ( -3.09721144373697E-01,  2.08311788594629E-01)
-
-PATH NUMBER =      5123
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.28002608957345E-01,  8.29289768021716E-01)
-X( 2) = (  3.30745140041808E-01, -6.26386459224908E-02)
-X( 3) = (  9.43250196226049E-01, -2.82425680121419E-01)
-X( 4) = ( -7.73819151623893E-01, -8.19221860145924E-01)
-
-X( 5) = ( -2.60657217723910E-01,  1.81625089041697E-01)
-
-PATH NUMBER =      5124
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.16043901364562E-01,  1.14284640091327E+00)
-X( 2) = (  5.50319500893088E-02,  2.33174198009443E-01)
-X( 3) = (  1.28412554434900E+00, -2.97140169079226E-01)
-X( 4) = ( -7.96455919764875E-01, -7.33979121389800E-01)
-
-X( 5) = ( -2.18002206140135E-01,  1.85362625994924E-01)
-
-PATH NUMBER =      5125
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.28728236996608E-01,  1.31107904710578E+00)
-X( 2) = ( -3.46321437833995E-01,  2.82554960978105E-01)
-X( 3) = (  1.55470950175978E+00, -8.93016713576728E-02)
-X( 4) = ( -8.68589666497630E-01, -6.83230029133799E-01)
-
-X( 5) = ( -1.86357756629087E-01,  2.05226654981188E-01)
-
-PATH NUMBER =      5126
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.00493808369175E-01,  1.25526978174817E+00)
-X( 2) = ( -6.85517312972742E-01,  6.23978351844083E-02)
-X( 3) = (  1.62839282758017E+00,  2.43839870091719E-01)
-X( 4) = ( -9.56468210048606E-01, -6.90720647657839E-01)
-
-X( 5) = ( -1.66048598385180E-01,  2.37100767459643E-01)
-
-PATH NUMBER =      5127
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.50748474436280E-02,  1.00153238035217E+00)
-X( 2) = ( -8.03842155607269E-01, -3.24283213438867E-01)
-X( 3) = (  1.47069827475986E+00,  5.46403825568960E-01)
-X( 4) = ( -1.01897220322908E+00, -7.52946033305570E-01)
-
-X( 5) = ( -1.62388849262770E-01,  2.81223519048589E-01)
-
-PATH NUMBER =      5128
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.71107606082440E-02,  6.68593393008067E-01)
-X( 2) = ( -6.45930456834736E-01, -6.96555824759730E-01)
-X( 3) = (  1.15541287714321E+00,  6.76817157682444E-01)
-X( 4) = ( -1.02685533297540E+00, -8.40790236574289E-01)
-
-X( 5) = ( -1.91976834245683E-01,  3.31850500851748E-01)
-
-PATH NUMBER =      5129
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.95338695271704E-01,  4.12238672098841E-01)
-X( 2) = ( -2.85670855503855E-01, -8.80229506591931E-01)
-X( 3) = (  8.30062176281935E-01,  5.74058018953533E-01)
-X( 4) = ( -9.76428995268033E-01, -9.13149978474990E-01)
-
-X( 5) = ( -2.69813887993821E-01,  3.48306409007342E-01)
-
-PATH NUMBER =      5130
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.22866058677290E-01,  3.52419440603290E-01)
-X( 2) = (  1.08367177083170E-01, -7.89361301900589E-01)
-X( 3) = (  6.46881380979295E-01,  2.86208552434099E-01)
-X( 4) = ( -8.91288233946578E-01, -9.36167331583383E-01)
-
-X( 5) = ( -3.30628286682972E-01,  2.81764146837408E-01)
-
-PATH NUMBER =      5131
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.22922084108907E-01,  5.88281062166935E-01)
-X( 2) = (  3.91196399796003E-01, -3.38537132032122E-01)
-X( 3) = (  8.35957901295439E-01,  1.33165677446209E-01)
-X( 4) = ( -5.76746600843466E-01, -1.15729939304975E+00)
-
-X( 5) = ( -2.38832467594489E-01,  2.68786648145620E-01)
-
-PATH NUMBER =      5132
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.38707056856392E-01,  9.00445048433765E-01)
-X( 2) = (  3.70132673603869E-01,  6.52936755937750E-02)
-X( 3) = (  1.08762527633632E+00, -9.72167252742717E-02)
-X( 4) = ( -5.39294394999856E-01, -1.07744903262501E+00)
-
-X( 5) = ( -2.09172275565166E-01,  2.25904837755082E-01)
-
-PATH NUMBER =      5133
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.26748349263608E-01,  1.21400168132531E+00)
-X( 2) = (  9.44194836513693E-02,  3.61106519525709E-01)
-X( 3) = (  1.42850062445927E+00, -1.11931214232078E-01)
-X( 4) = ( -5.61931163140838E-01, -9.92206293868887E-01)
-
-X( 5) = ( -1.71448853338482E-01,  2.13510789885221E-01)
-
-PATH NUMBER =      5134
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.39432684895654E-01,  1.38223432751782E+00)
-X( 2) = ( -3.06933904271935E-01,  4.10487282494371E-01)
-X( 3) = (  1.69908458187005E+00,  9.59072834894754E-02)
-X( 4) = ( -6.34064909873593E-01, -9.41457201612887E-01)
-
-X( 5) = ( -1.38553328609744E-01,  2.20032005841928E-01)
-
-PATH NUMBER =      5135
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.88017437317802E-02,  1.32642506216022E+00)
-X( 2) = ( -6.46129779410681E-01,  1.90330156700673E-01)
-X( 3) = (  1.77276790769044E+00,  4.29048824938867E-01)
-X( 4) = ( -7.21943453424568E-01, -9.48947820136926E-01)
-
-X( 5) = ( -1.12847477613453E-01,  2.39859812224802E-01)
-
-PATH NUMBER =      5136
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.04370399544583E-01,  1.07268766076422E+00)
-X( 2) = ( -7.64454622045208E-01, -1.96350891922602E-01)
-X( 3) = (  1.61507335487013E+00,  7.31612780416109E-01)
-X( 4) = ( -7.84447446605040E-01, -1.01117320578466E+00)
-
-X( 5) = ( -9.76506428650514E-02,  2.72672693889520E-01)
-
-PATH NUMBER =      5137
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.06406312709198E-01,  7.39748673420115E-01)
-X( 2) = ( -6.06542923272675E-01, -5.68623503243464E-01)
-X( 3) = (  1.29978795725348E+00,  8.62026112529592E-01)
-X( 4) = ( -7.92330576351359E-01, -1.09901740905338E+00)
-
-X( 5) = ( -1.04065509606277E-01,  3.17843259131941E-01)
-
-PATH NUMBER =      5138
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.39568568292496E-02,  4.83393952510889E-01)
-X( 2) = ( -2.46283321941795E-01, -7.52297185075665E-01)
-X( 3) = (  9.74437256392209E-01,  7.59266973800681E-01)
-X( 4) = ( -7.41904238643995E-01, -1.17137715095408E+00)
-
-X( 5) = ( -1.51733541033348E-01,  3.55793162407697E-01)
-
-PATH NUMBER =      5139
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.33570506576336E-01,  4.23574721015338E-01)
-X( 2) = (  1.47754710645231E-01, -6.61428980384324E-01)
-X( 3) = (  7.91256461089569E-01,  4.71417507281247E-01)
-X( 4) = ( -6.56763477322541E-01, -1.19439450406247E+00)
-
-X( 5) = ( -2.21703465483041E-01,  3.34564547915107E-01)
-
-PATH NUMBER =      5140
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.55571101390299E-01,  4.56833572897236E-01)
-X( 2) = (  3.39135689860291E-01, -2.15217469489471E-01)
-X( 3) = (  8.27505607760030E-01,  3.67846480765126E-01)
-X( 4) = ( -2.31104987303845E-01, -1.20436327586700E+00)
-
-X( 5) = ( -1.78826965703897E-01,  3.45012449249641E-01)
-
-PATH NUMBER =      5141
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.71356074137784E-01,  7.68997559164066E-01)
-X( 2) = (  3.18071963668157E-01,  1.88613338136425E-01)
-X( 3) = (  1.07917298280091E+00,  1.37464078044645E-01)
-X( 4) = ( -1.93652781460236E-01, -1.12451291544226E+00)
-
-X( 5) = ( -1.69899906666719E-01,  2.84950072519425E-01)
-
-PATH NUMBER =      5142
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.59397366545001E-01,  1.08255419205562E+00)
-X( 2) = (  4.23587737156579E-02,  4.84426182068359E-01)
-X( 3) = (  1.42004833092386E+00,  1.22749589086838E-01)
-X( 4) = ( -2.16289549601218E-01, -1.03927017668613E+00)
-
-X( 5) = ( -1.35767404870934E-01,  2.55337365456762E-01)
-
-PATH NUMBER =      5143
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.79182978229533E-02,  1.25078683824813E+00)
-X( 2) = ( -3.58994614207646E-01,  5.33806945037021E-01)
-X( 3) = (  1.69063228833464E+00,  3.30588086808392E-01)
-X( 4) = ( -2.88423296333972E-01, -9.88521084430133E-01)
-
-X( 5) = ( -9.97709770573105E-02,  2.49043523428786E-01)
-
-PATH NUMBER =      5144
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.56152726450386E-01,  1.19497757289052E+00)
-X( 2) = ( -6.98190489346393E-01,  3.13649819243324E-01)
-X( 3) = (  1.76431561415503E+00,  6.63729628257783E-01)
-X( 4) = ( -3.76301839884948E-01, -9.96011702954173E-01)
-
-X( 5) = ( -6.74065947768638E-02,  2.58743327675870E-01)
-
-PATH NUMBER =      5145
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.71721382263189E-01,  9.41240171494523E-01)
-X( 2) = ( -8.16515331980920E-01, -7.30312293799510E-02)
-X( 3) = (  1.60662106133472E+00,  9.66293583735023E-01)
-X( 4) = ( -4.38805833065421E-01, -1.05823708860190E+00)
-
-X( 5) = ( -4.10760283431835E-02,  2.83382573229910E-01)
-
-PATH NUMBER =      5146
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.73757295427805E-01,  6.08301184150417E-01)
-X( 2) = ( -6.58603633208387E-01, -4.45303840700814E-01)
-X( 3) = (  1.29133566371808E+00,  1.09670691584851E+00)
-X( 4) = ( -4.46688962811740E-01, -1.14608129187062E+00)
-
-X( 5) = ( -2.85611304321602E-02,  3.25658614889497E-01)
-
-PATH NUMBER =      5147
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.61307839547857E-01,  3.51946463241191E-01)
-X( 2) = ( -2.98344031877506E-01, -6.28977522533014E-01)
-X( 3) = (  9.65984962856801E-01,  9.93947777119597E-01)
-X( 4) = ( -3.96262625104375E-01, -1.21844103377132E+00)
-
-X( 5) = ( -5.16335887226551E-02,  3.80014486256083E-01)
-
-PATH NUMBER =      5148
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.37804761422711E-02,  2.92127231745640E-01)
-X( 2) = (  9.56940007095193E-02, -5.38109317841673E-01)
-X( 3) = (  7.82804167554161E-01,  7.06098310600163E-01)
-X( 4) = ( -3.11121863782920E-01, -1.24145838687972E+00)
-
-X( 5) = ( -1.24707128711810E-01,  3.99132074729989E-01)
-
-PATH NUMBER =      5149
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.35261184143278E-01,  1.84289055051201E-01)
-X( 2) = (  2.19986521196068E-01, -1.54213106569527E-01)
-X( 3) = (  6.70180862660937E-01,  5.42189376496285E-01)
-X( 4) = (  6.39239307975245E-02, -1.01824215519542E+00)
-
-X( 5) = ( -1.24770030771224E-01,  4.62370507427402E-01)
-
-PATH NUMBER =      5150
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.51046156890762E-01,  4.96453041318030E-01)
-X( 2) = (  1.98922795003934E-01,  2.49617701056371E-01)
-X( 3) = (  9.21848237701821E-01,  3.11806973775806E-01)
-X( 4) = (  1.01376136641135E-01, -9.38391794770682E-01)
-
-X( 5) = ( -1.45722709659689E-01,  3.74237727263917E-01)
-
-PATH NUMBER =      5151
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.39087449297979E-01,  8.10009674209581E-01)
-X( 2) = ( -7.67903949485642E-02,  5.45430544988305E-01)
-X( 3) = (  1.26272358582477E+00,  2.97092484817998E-01)
-X( 4) = (  7.87393685001525E-02, -8.53149056014558E-01)
-
-X( 5) = ( -1.12756006726044E-01,  3.19316098261669E-01)
-
-PATH NUMBER =      5152
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.48228215069975E-01,  9.78242320402091E-01)
-X( 2) = ( -4.78143782871869E-01,  5.94811307956966E-01)
-X( 3) = (  1.53330754323555E+00,  5.04930982539552E-01)
-X( 4) = (  6.60562176739789E-03, -8.02399963758557E-01)
-
-X( 5) = ( -6.94495221528941E-02,  2.97112712324596E-01)
-
-PATH NUMBER =      5153
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.76462643697408E-01,  9.22433055044487E-01)
-X( 2) = ( -8.17339658010615E-01,  3.74654182163270E-01)
-X( 3) = (  1.60699086905594E+00,  8.38072523988943E-01)
-X( 4) = ( -8.12729217835778E-02, -8.09890582282598E-01)
-
-X( 5) = ( -2.67442176347766E-02,  2.96045605241290E-01)
-
-PATH NUMBER =      5154
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.92031299510210E-01,  6.68695653648488E-01)
-X( 2) = ( -9.35664500645142E-01, -1.20268664600055E-02)
-X( 3) = (  1.44929631623563E+00,  1.14063647946618E+00)
-X( 4) = ( -1.43776914964050E-01, -8.72115967930328E-01)
-
-X( 5) = (  1.36753917259928E-02,  3.13128947191918E-01)
-
-PATH NUMBER =      5155
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.94067212674827E-01,  3.35756666304382E-01)
-X( 2) = ( -7.77752801872609E-01, -3.84299477780868E-01)
-X( 3) = (  1.13401091861898E+00,  1.27104981157967E+00)
-X( 4) = ( -1.51660044710369E-01, -9.59960171199047E-01)
-
-X( 5) = (  4.74488840602473E-02,  3.53528879353462E-01)
-
-PATH NUMBER =      5156
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.81617756794879E-01,  7.94019453951553E-02)
-X( 2) = ( -4.17493200541729E-01, -5.67973159613069E-01)
-X( 3) = (  8.08660217757708E-01,  1.16829067285076E+00)
-X( 4) = ( -1.01233707003004E-01, -1.03231991309975E+00)
-
-X( 5) = (  5.31145229076423E-02,  4.25315951418930E-01)
-
-PATH NUMBER =      5157
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.54090393389293E-01,  1.95827138996044E-02)
-X( 2) = ( -2.34551679547028E-02, -4.77104954921728E-01)
-X( 3) = (  6.25479422455067E-01,  8.80441206331323E-01)
-X( 4) = ( -1.60929456815499E-02, -1.05533726620814E+00)
-
-X( 5) = ( -1.79777539112937E-02,  4.95894101305371E-01)
-
-PATH NUMBER =      5158
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.18286679743516E-01, -1.01825882476093E-01)
-X( 2) = (  8.95001140168339E-02, -1.84068662670503E-01)
-X( 3) = (  4.37597662699806E-01,  5.74617386121622E-01)
-X( 4) = (  1.70292843799820E-01, -6.86024171903101E-01)
-
-X( 5) = ( -1.12738022465158E-01,  6.96738093901116E-01)
-
-PATH NUMBER =      5159
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.34071652491001E-01,  2.10338103790736E-01)
-X( 2) = (  6.84363878246998E-02,  2.19762144955394E-01)
-X( 3) = (  6.89265037740689E-01,  3.44234983401142E-01)
-X( 4) = (  2.07745049643431E-01, -6.06173811478359E-01)
-
-X( 5) = ( -1.80619646502035E-01,  5.25080689563101E-01)
-
-PATH NUMBER =      5160
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.22112944898218E-01,  5.23894736682286E-01)
-X( 2) = ( -2.07276802127799E-01,  5.15574988887328E-01)
-X( 3) = (  1.03014038586364E+00,  3.29520494443335E-01)
-X( 4) = (  1.85108281502449E-01, -5.20931072722235E-01)
-
-X( 5) = ( -1.29496902024474E-01,  4.21663174847798E-01)
-
-PATH NUMBER =      5161
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.52027194697361E-02,  6.92127382874797E-01)
-X( 2) = ( -6.08630190051103E-01,  5.64955751855990E-01)
-X( 3) = (  1.30072434327442E+00,  5.37358992164888E-01)
-X( 4) = (  1.12974534769693E-01, -4.70181980466235E-01)
-
-X( 5) = ( -6.28985157744536E-02,  3.78030772277608E-01)
-
-PATH NUMBER =      5162
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.93437148097170E-01,  6.36318117517193E-01)
-X( 2) = ( -9.47826065189850E-01,  3.44798626062293E-01)
-X( 3) = (  1.37440766909481E+00,  8.70500533614280E-01)
-X( 4) = (  2.50959912187181E-02, -4.77672598990275E-01)
-
-X( 5) = (  2.00992752445609E-03,  3.65862271497659E-01)
-
-PATH NUMBER =      5163
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.09005803909972E-01,  3.82580716121194E-01)
-X( 2) = ( -1.06615090782438E+00, -4.18824225609822E-02)
-X( 3) = (  1.21671311627450E+00,  1.17306448909152E+00)
-X( 4) = ( -3.74080019617543E-02, -5.39897984638006E-01)
-
-X( 5) = (  6.70485800777900E-02,  3.77160746196200E-01)
-
-PATH NUMBER =      5164
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.11041717074588E-01,  4.96417287770873E-02)
-X( 2) = ( -9.08239209051844E-01, -4.14155033881845E-01)
-X( 3) = (  9.01427718657851E-01,  1.30347782120500E+00)
-X( 4) = ( -4.52911317080733E-02, -6.27742187906725E-01)
-
-X( 5) = (  1.34155043687454E-01,  4.19827741837494E-01)
-
-PATH NUMBER =      5165
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.98592261194640E-01, -2.06712992132138E-01)
-X( 2) = ( -5.47979607720963E-01, -5.97828715714045E-01)
-X( 3) = (  5.76077017796577E-01,  1.20071868247609E+00)
-X( 4) = (  5.13520599929103E-03, -7.00101929807426E-01)
-
-X( 5) = (  1.86675533370336E-01,  5.22290353866305E-01)
-
-PATH NUMBER =      5166
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.10648977890542E-02, -2.66532223627689E-01)
-X( 2) = ( -1.53941575133937E-01, -5.06960511022704E-01)
-X( 3) = (  3.92896222493936E-01,  9.12869215956660E-01)
-X( 4) = (  9.02759673207457E-02, -7.23119282915819E-01)
-
-X( 5) = (  1.21713892913618E-01,  6.94707990734967E-01)
-
-PATH NUMBER =      5167
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.65799036074061E-01, -2.67634880602293E-01)
-X( 2) = (  8.73250843662978E-03, -2.90814391285208E-01)
-X( 3) = (  2.38584272012788E-01,  4.49957083540257E-01)
-X( 4) = (  3.82305551504803E-02, -3.63157812564122E-01)
-
-X( 5) = ( -5.71215078322845E-01,  1.08530347076268E+00)
-
-PATH NUMBER =      5168
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.81584008821546E-01,  4.45291056645363E-02)
-X( 2) = ( -1.23312177555042E-02,  1.13016416340689E-01)
-X( 3) = (  4.90251647053672E-01,  2.19574680819777E-01)
-X( 4) = (  7.56827609940910E-02, -2.83307452139380E-01)
-
-X( 5) = ( -4.62355700969861E-01,  6.41621124980586E-01)
-
-PATH NUMBER =      5169
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.69625301228763E-01,  3.58085738556087E-01)
-X( 2) = ( -2.88044407708003E-01,  4.08829260272623E-01)
-X( 3) = (  8.31126995176620E-01,  2.04860191861970E-01)
-X( 4) = (  5.30459928531086E-02, -1.98064713383257E-01)
-
-X( 5) = ( -2.83291489475439E-01,  5.15408045068139E-01)
-
-PATH NUMBER =      5170
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.82309636860809E-01,  5.26318384748597E-01)
-X( 2) = ( -6.89397795631307E-01,  4.58210023241285E-01)
-X( 3) = (  1.10171095258740E+00,  4.12698689583524E-01)
-X( 4) = ( -1.90877538796464E-02, -1.47315621127256E-01)
-
-X( 5) = ( -1.47768944416790E-01,  4.81855243081229E-01)
-
-PATH NUMBER =      5171
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.45924791766625E-01,  4.70509119390993E-01)
-X( 2) = ( -1.02859367077005E+00,  2.38052897447589E-01)
-X( 3) = (  1.17539427840779E+00,  7.45840231032915E-01)
-X( 4) = ( -1.06966297430622E-01, -1.54806239651296E-01)
-
-X( 5) = ( -3.25971501451849E-02,  4.84168775219191E-01)
-
-PATH NUMBER =      5172
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.61493447579427E-01,  2.16771717994993E-01)
-X( 2) = ( -1.14691851340458E+00, -1.48628151175687E-01)
-X( 3) = (  1.01769972558748E+00,  1.04840418651016E+00)
-X( 4) = ( -1.69470290611094E-01, -2.17031625299027E-01)
-
-X( 5) = (  8.25576098035747E-02,  5.15012770538673E-01)
-
-PATH NUMBER =      5173
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.63529360744044E-01, -1.16167269349113E-01)
-X( 2) = ( -9.89006814632048E-01, -5.20900762496550E-01)
-X( 3) = (  7.02414327970834E-01,  1.17881751862364E+00)
-X( 4) = ( -1.77353420357413E-01, -3.04875828567746E-01)
-
-X( 5) = (  2.15629439516302E-01,  5.95747875885215E-01)
-
-PATH NUMBER =      5174
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.51079904864095E-01, -3.72521990258339E-01)
-X( 2) = ( -6.28747213301167E-01, -7.04574444328750E-01)
-X( 3) = (  3.77063627109559E-01,  1.07605837989473E+00)
-X( 4) = ( -1.26927082650049E-01, -3.77235570468447E-01)
-
-X( 5) = (  3.63487910467059E-01,  8.18309474001191E-01)
-
-PATH NUMBER =      5175
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.76447458541491E-01, -4.32341221753889E-01)
-X( 2) = ( -2.34709180714142E-01, -6.13706239637409E-01)
-X( 3) = (  1.93882831806919E-01,  7.88208913375295E-01)
-X( 4) = ( -4.17863213285940E-02, -4.00252923576840E-01)
-
-X( 5) = (  1.73472930064060E-01,  1.36790511680470E+00)
-
-PATH NUMBER =      5176
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.61984470814419E-01, -2.35554066342400E-01)
-X( 2) = (  1.54757647383830E-02, -4.24502779648193E-01)
-X( 3) = (  1.66261267889808E-01,  2.26538409774951E-01)
-X( 4) = ( -2.70469522582618E-01, -2.00715834973085E-01)
-
-X( 5) = ( -9.70881749382453E-01,  3.13859673460590E-01)
-
-PATH NUMBER =      5177
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.77769443561905E-01,  7.66099199244297E-02)
-X( 2) = ( -5.58796145375100E-03, -2.06719720222961E-02)
-X( 3) = (  4.17928642930692E-01, -3.84399294552909E-03)
-X( 4) = ( -2.33017316739008E-01, -1.20865474548343E-01)
-
-X( 5) = ( -6.34495822345633E-01,  2.97495918390809E-01)
-
-PATH NUMBER =      5178
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.65810735969121E-01,  3.90166552815980E-01)
-X( 2) = ( -2.81301151406250E-01,  2.75140871909638E-01)
-X( 3) = (  7.58803991053640E-01, -1.85584819033358E-02)
-X( 4) = ( -2.55654084879990E-01, -3.56227357922196E-02)
-
-X( 5) = ( -4.53233774887149E-01,  3.53520928448916E-01)
-
-PATH NUMBER =      5179
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.78495071601167E-01,  5.58399199008490E-01)
-X( 2) = ( -6.82654539329554E-01,  3.24521634878299E-01)
-X( 3) = (  1.02938794846442E+00,  1.89280015818218E-01)
-X( 4) = ( -3.27787831612745E-01,  1.51263564637811E-02)
-
-X( 5) = ( -3.27117014924698E-01,  4.25827869768990E-01)
-
-PATH NUMBER =      5180
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.50260642973733E-01,  5.02589933650887E-01)
-X( 2) = ( -1.02185041446830E+00,  1.04364509084603E-01)
-X( 3) = (  1.10307127428481E+00,  5.22421557267610E-01)
-X( 4) = ( -4.15666375163721E-01,  7.63573793974103E-03)
-
-X( 5) = ( -2.19132585793459E-01,  5.18660377527204E-01)
-
-PATH NUMBER =      5181
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.53080128390690E-02,  2.48852532254887E-01)
-X( 2) = ( -1.14017525710283E+00, -2.82316539538672E-01)
-X( 3) = (  9.45376721464503E-01,  8.24985512744850E-01)
-X( 4) = ( -4.78170368344193E-01, -5.45896477079898E-02)
-
-X( 5) = ( -1.11710549641351E-01,  6.59983676756830E-01)
-
-PATH NUMBER =      5182
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.73439260036849E-02, -8.40864550892192E-02)
-X( 2) = ( -9.82263558330295E-01, -6.54589150859535E-01)
-X( 3) = (  6.30091323847854E-01,  9.55398844858334E-01)
-X( 4) = ( -4.86053498090512E-01, -1.42433850976709E-01)
-
-X( 5) = ( -1.37789155570488E-02,  9.39589009253130E-01)
-
-PATH NUMBER =      5183
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.45105529876263E-01, -3.40441175998445E-01)
-X( 2) = ( -6.22003956999414E-01, -8.38262832691736E-01)
-X( 3) = (  3.04740622986579E-01,  8.52639706129423E-01)
-X( 4) = ( -4.35627160383147E-01, -2.14793592877410E-01)
-
-X( 5) = ( -2.68269353363201E-01,  1.62064054356636E+00)
-
-PATH NUMBER =      5184
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.72632893281849E-01, -4.00260407493996E-01)
-X( 2) = ( -2.27965924412388E-01, -7.47394628000394E-01)
-X( 3) = (  1.21559827683939E-01,  5.64790239609989E-01)
-X( 4) = ( -3.50486399061693E-01, -2.37810945985803E-01)
-
-X( 5) = ( -1.52492215002055E+00,  9.89237845574178E-01)
-
-PATH NUMBER =      5185
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.04084331678487E-01, -2.88180859453672E-02)
-X( 2) = (  3.08931422011529E-01, -3.02882137186908E-01)
-X( 3) = ( -2.67389774679840E-01,  9.17907364830912E-02)
-X( 4) = ( -3.49166758683513E-01, -2.75929568935992E-01)
-
-X( 5) = ( -6.93478961769275E-01,  6.40321791593525E-01)
-
-PATH NUMBER =      5186
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01986930442597E+00,  2.83345900321462E-01)
-X( 2) = (  2.87867695819396E-01,  1.00948670438989E-01)
-X( 3) = ( -1.57223996389557E-02, -1.38591666237389E-01)
-X( 4) = ( -3.11714552839903E-01, -1.96079208511250E-01)
-
-X( 5) = ( -4.85987132310850E-01,  4.36945874983062E-01)
-
-PATH NUMBER =      5187
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.07910596833188E-01,  5.96902533213013E-01)
-X( 2) = (  1.21545058668969E-02,  3.96761514370923E-01)
-X( 3) = (  3.25152948483992E-01, -1.53306155195195E-01)
-X( 4) = ( -3.34351320980885E-01, -1.10836469755127E-01)
-
-X( 5) = ( -3.29579088621402E-01,  4.02555765240810E-01)
-
-PATH NUMBER =      5188
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.20594932465235E-01,  7.65135179405523E-01)
-X( 2) = ( -3.89198882056407E-01,  4.46142277339585E-01)
-X( 3) = (  5.95736905894771E-01,  5.45323425263578E-02)
-X( 4) = ( -4.06485067713640E-01, -6.00873774991261E-02)
-
-X( 5) = ( -2.15522178708239E-01,  4.16404531544412E-01)
-
-PATH NUMBER =      5189
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.92360503837801E-01,  7.09325914047919E-01)
-X( 2) = ( -7.28394757195154E-01,  2.25985151545888E-01)
-X( 3) = (  6.69420231715162E-01,  3.87673883975750E-01)
-X( 4) = ( -4.94363611264615E-01, -6.75779960231662E-02)
-
-X( 5) = ( -1.19231099194585E-01,  4.55843727035085E-01)
-
-PATH NUMBER =      5190
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.67918480249982E-02,  4.55588512651920E-01)
-X( 2) = ( -8.46719599829681E-01, -1.60695897077387E-01)
-X( 3) = (  5.11725678894854E-01,  6.90237839452990E-01)
-X( 4) = ( -5.56867604445087E-01, -1.29803381670897E-01)
-
-X( 5) = ( -2.65673792882150E-02,  5.27695765798793E-01)
-
-PATH NUMBER =      5191
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.47559348603822E-02,  1.22649525307813E-01)
-X( 2) = ( -6.88807901057148E-01, -5.32968508398250E-01)
-X( 3) = (  1.96440281278205E-01,  8.20651171566474E-01)
-X( 4) = ( -5.64750734191406E-01, -2.17647584939616E-01)
-
-X( 5) = (  6.25937975680341E-02,  6.69219834252310E-01)
-
-PATH NUMBER =      5192
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.87205390740330E-01, -1.33705195601413E-01)
-X( 2) = ( -3.28548299726268E-01, -7.16642190230451E-01)
-X( 3) = ( -1.28910419583070E-01,  7.17892032837563E-01)
-X( 4) = ( -5.14324396484042E-01, -2.90007326840317E-01)
-
-X( 5) = (  5.26854882840330E-02,  9.79643833638808E-01)
-
-PATH NUMBER =      5193
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.14732754145917E-01, -1.93524427096964E-01)
-X( 2) = (  6.54897328607581E-02, -6.25773985539109E-01)
-X( 3) = ( -3.12091214885710E-01,  4.30042566318129E-01)
-X( 4) = ( -4.29183635162588E-01, -3.13024679948710E-01)
-
-X( 5) = ( -5.05495475471351E-01,  1.17854788043868E+00)
-
-PATH NUMBER =      5194
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.23922958066550E-01,  2.68438401450530E-01)
-X( 2) = (  4.41759737527445E-01, -3.19456071114854E-01)
-X( 3) = ( -5.99240904574150E-02, -1.82297642544606E-02)
-X( 4) = ( -5.62746083573794E-01, -5.51732045457722E-01)
-
-X( 5) = ( -4.18803749535869E-01,  3.86972633192781E-01)
-
-PATH NUMBER =      5195
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03970793081404E+00,  5.80602387717360E-01)
-X( 2) = (  4.20696011335311E-01,  8.43747365110424E-02)
-X( 3) = (  1.91743284583469E-01, -2.48612166974941E-01)
-X( 4) = ( -5.25293877730183E-01, -4.71881685032981E-01)
-
-X( 5) = ( -3.32980281600235E-01,  3.02046507870135E-01)
-
-PATH NUMBER =      5196
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.27749223221252E-01,  8.94159020608910E-01)
-X( 2) = (  1.44982821382813E-01,  3.80187580442976E-01)
-X( 3) = (  5.32618632706417E-01, -2.63326655932747E-01)
-X( 4) = ( -5.47930645871165E-01, -3.86638946276857E-01)
-
-X( 5) = ( -2.53270366527717E-01,  2.87196867449190E-01)
-
-PATH NUMBER =      5197
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.40433558853298E-01,  1.06239166680142E+00)
-X( 2) = ( -2.56370566540492E-01,  4.29568343411639E-01)
-X( 3) = (  8.03202590117196E-01, -5.54881582111939E-02)
-X( 4) = ( -6.20064392603920E-01, -3.35889854020857E-01)
-
-X( 5) = ( -1.90638265884969E-01,  3.02655462272947E-01)
-
-PATH NUMBER =      5198
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.12199130225864E-01,  1.00658240144382E+00)
-X( 2) = ( -5.95566441679238E-01,  2.09411217617942E-01)
-X( 3) = (  8.76885915937586E-01,  2.77653383238197E-01)
-X( 4) = ( -7.07942936154895E-01, -3.43380472544897E-01)
-
-X( 5) = ( -1.40128685283632E-01,  3.37989718760697E-01)
-
-PATH NUMBER =      5199
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.66304744130616E-02,  7.52845000047818E-01)
-X( 2) = ( -7.13891284313765E-01, -1.77269831005333E-01)
-X( 3) = (  7.19191363117279E-01,  5.80217338715438E-01)
-X( 4) = ( -7.70446929335368E-01, -4.05605858192628E-01)
-
-X( 5) = ( -1.01767215459707E-01,  3.97364107788594E-01)
-
-PATH NUMBER =      5200
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.45945612484451E-02,  4.19906012703711E-01)
-X( 2) = ( -5.55979585541232E-01, -5.49542442326196E-01)
-X( 3) = (  4.03905965500630E-01,  7.10630670828922E-01)
-X( 4) = ( -7.78330059081687E-01, -4.93450061461346E-01)
-
-X( 5) = ( -9.39312986907628E-02,  4.94244337816263E-01)
-
-PATH NUMBER =      5201
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.07044017128394E-01,  1.63551291794485E-01)
-X( 2) = ( -1.95719984210352E-01, -7.33216124158397E-01)
-X( 3) = (  7.85552646393551E-02,  6.07871532100011E-01)
-X( 4) = ( -7.27903721374322E-01, -5.65809803362048E-01)
-
-X( 5) = ( -1.87608948850330E-01,  6.14157711516027E-01)
-
-PATH NUMBER =      5202
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.34571380533979E-01,  1.03732060298934E-01)
-X( 2) = (  1.98318048376674E-01, -6.42347919467055E-01)
-X( 3) = ( -1.04625530663285E-01,  3.20022065580577E-01)
-X( 4) = ( -6.42762960052868E-01, -5.88827156470441E-01)
-
-X( 5) = ( -3.92973990689329E-01,  5.71430579306334E-01)
-
-PATH NUMBER =      5203
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.48047440573213E-01,  5.08902105036672E-01)
-X( 2) = (  5.54165649889914E-01, -2.46772045671814E-01)
-X( 3) = (  1.69723658764658E-01,  3.08460137796850E-02)
-X( 4) = ( -5.49074923942065E-01, -9.00295143720336E-01)
-
-X( 5) = ( -2.53671309130872E-01,  3.46523537505981E-01)
-
-PATH NUMBER =      5204
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.63832413320698E-01,  8.21066091303501E-01)
-X( 2) = (  5.33101923697780E-01,  1.57058761954083E-01)
-X( 3) = (  4.21391033805541E-01, -1.99536388940795E-01)
-X( 4) = ( -5.11622718098454E-01, -8.20444783295594E-01)
-
-X( 5) = ( -2.23098950066913E-01,  2.80747377692584E-01)
-
-PATH NUMBER =      5205
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.51873705727915E-01,  1.13462272419505E+00)
-X( 2) = (  2.57388733745282E-01,  4.52871605886017E-01)
-X( 3) = (  7.62266381928489E-01, -2.14250877898602E-01)
-X( 4) = ( -5.34259486239436E-01, -7.35202044539470E-01)
-
-X( 5) = ( -1.76149368093720E-01,  2.56981772057789E-01)
-
-PATH NUMBER =      5206
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.64558041359961E-01,  1.30285537038756E+00)
-X( 2) = ( -1.43964654178023E-01,  5.02252368854680E-01)
-X( 3) = (  1.03285033933927E+00, -6.41238017704831E-03)
-X( 4) = ( -6.06393232972191E-01, -6.84452952283470E-01)
-
-X( 5) = ( -1.33487206216987E-01,  2.58466648494387E-01)
-
-PATH NUMBER =      5207
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.36323612732527E-01,  1.24704610502996E+00)
-X( 2) = ( -4.83160529316770E-01,  2.82095243060983E-01)
-X( 3) = (  1.10653366515966E+00,  3.26729161272344E-01)
-X( 4) = ( -6.94271776523166E-01, -6.91943570807510E-01)
-
-X( 5) = ( -9.76636368802596E-02,  2.76722794730878E-01)
-
-PATH NUMBER =      5208
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.92450430802758E-02,  9.93308703633958E-01)
-X( 2) = ( -6.01485371951296E-01, -1.04585805562293E-01)
-X( 3) = (  9.48839112339351E-01,  6.29293116749584E-01)
-X( 4) = ( -7.56775769703638E-01, -7.54168956455240E-01)
-
-X( 5) = ( -7.07493058213639E-02,  3.11766709861825E-01)
-
-PATH NUMBER =      5209
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.12809562448921E-02,  6.60369716289853E-01)
-X( 2) = ( -4.43573673178764E-01, -4.76858416883155E-01)
-X( 3) = (  6.33553714722703E-01,  7.59706448863069E-01)
-X( 4) = ( -7.64658899449958E-01, -8.42013159723960E-01)
-
-X( 5) = ( -6.37909202510523E-02,  3.67497645740627E-01)
-
-PATH NUMBER =      5210
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.31168499635057E-01,  4.04014995380627E-01)
-X( 2) = ( -8.33140718478829E-02, -6.60532098715356E-01)
-X( 3) = (  3.08203013861428E-01,  6.56947310134157E-01)
-X( 4) = ( -7.14232561742593E-01, -9.14372901624661E-01)
-
-X( 5) = ( -1.07649204000139E-01,  4.32325313936638E-01)
-
-PATH NUMBER =      5211
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.58695863040642E-01,  3.44195763885076E-01)
-X( 2) = (  3.10723960739143E-01, -5.69663894024014E-01)
-X( 3) = (  1.25022218558787E-01,  3.69097843614723E-01)
-X( 4) = ( -6.29091800421138E-01, -9.37390254733054E-01)
-
-X( 5) = ( -2.08369592444832E-01,  4.32392504323359E-01)
-
-PATH NUMBER =      5212
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.58751888472259E-01,  5.80057385448720E-01)
-X( 2) = (  5.93553183451975E-01, -1.18839724155548E-01)
-X( 3) = (  3.14098738874931E-01,  2.16054968626833E-01)
-X( 4) = ( -3.14550167318027E-01, -1.15852231619942E+00)
-
-X( 5) = ( -1.41511387750842E-01,  3.48613906081310E-01)
-
-PATH NUMBER =      5213
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.74536861219744E-01,  8.92221371715549E-01)
-X( 2) = (  5.72489457259841E-01,  2.84991083470349E-01)
-X( 3) = (  5.65766113915815E-01, -1.43274340936474E-02)
-X( 4) = ( -2.77097961474417E-01, -1.07867195577468E+00)
-
-X( 5) = ( -1.43012387481569E-01,  2.91150641540256E-01)
-
-PATH NUMBER =      5214
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.62578153626961E-01,  1.20577800460710E+00)
-X( 2) = (  2.96776267307342E-01,  5.80803927402283E-01)
-X( 3) = (  9.06641462038763E-01, -2.90419230514539E-02)
-X( 4) = ( -2.99734729615399E-01, -9.93429217018558E-01)
-
-X( 5) = ( -1.15009391840723E-01,  2.58264028822766E-01)
-
-PATH NUMBER =      5215
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.75262489259006E-01,  1.37401065079961E+00)
-X( 2) = ( -1.04577120615962E-01,  6.30184690370945E-01)
-X( 3) = (  1.17722541944954E+00,  1.78796574670099E-01)
-X( 4) = ( -3.71868476348153E-01, -9.42680124762557E-01)
-
-X( 5) = ( -8.18575785492515E-02,  2.47831918357708E-01)
-
-PATH NUMBER =      5216
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.52971939368427E-01,  1.31820138544201E+00)
-X( 2) = ( -4.43772995754709E-01,  4.10027564577249E-01)
-X( 3) = (  1.25090874526993E+00,  5.11938116119491E-01)
-X( 4) = ( -4.59747019899128E-01, -9.50170743286597E-01)
-
-X( 5) = ( -5.05761037396531E-02,  2.53247619661725E-01)
-
-PATH NUMBER =      5217
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.68540595181230E-01,  1.06446398404601E+00)
-X( 2) = ( -5.62097838389236E-01,  2.33465159539735E-02)
-X( 3) = (  1.09321419244962E+00,  8.14502071596732E-01)
-X( 4) = ( -5.22251013079600E-01, -1.01239612893433E+00)
-
-X( 5) = ( -2.37802076847856E-02,  2.73090513469978E-01)
-
-PATH NUMBER =      5218
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.70576508345846E-01,  7.31524996701900E-01)
-X( 2) = ( -4.04186139616703E-01, -3.48926095366889E-01)
-X( 3) = (  7.77928794832976E-01,  9.44915403710216E-01)
-X( 4) = ( -5.30134142825920E-01, -1.10024033220305E+00)
-
-X( 5) = ( -7.94897773770072E-03,  3.09843708329099E-01)
-
-PATH NUMBER =      5219
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.58127052465898E-01,  4.75170275792674E-01)
-X( 2) = ( -4.39265382858227E-02, -5.32599777199090E-01)
-X( 3) = (  4.52578093971701E-01,  8.42156264981305E-01)
-X( 4) = ( -4.79707805118555E-01, -1.17260007410375E+00)
-
-X( 5) = ( -2.17566562765402E-02,  3.60766979026091E-01)
-
-PATH NUMBER =      5220
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.69400310939688E-01,  4.15351044297123E-01)
-X( 2) = (  3.50111494301203E-01, -4.41731572507749E-01)
-X( 3) = (  2.69397298669061E-01,  5.54306798461871E-01)
-X( 4) = ( -3.94567043797101E-01, -1.19561742721214E+00)
-
-X( 5) = ( -8.34630803467996E-02,  3.88463871729725E-01)
-
-PATH NUMBER =      5221
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.91400905753651E-01,  4.48609896179021E-01)
-X( 2) = (  5.41492473516263E-01,  4.47993838710285E-03)
-X( 3) = (  3.05646445339523E-01,  4.50735771945749E-01)
-X( 4) = (  3.10914462215938E-02, -1.20558619901667E+00)
-
-X( 5) = ( -4.65279153484913E-02,  3.68890907798047E-01)
-
-PATH NUMBER =      5222
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.07185878501136E-01,  7.60773882445850E-01)
-X( 2) = (  5.20428747324129E-01,  4.08310746013000E-01)
-X( 3) = (  5.57313820380407E-01,  2.20353369225269E-01)
-X( 4) = (  6.85436520652044E-02, -1.12573583859193E+00)
-
-X( 5) = ( -7.46711384884251E-02,  3.18910314086116E-01)
-
-PATH NUMBER =      5223
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.95227170908353E-01,  1.07433051533740E+00)
-X( 2) = (  2.44715557371630E-01,  7.04123589944934E-01)
-X( 3) = (  8.98189168503354E-01,  2.05638880267462E-01)
-X( 4) = (  4.59068839242221E-02, -1.04049309983580E+00)
-
-X( 5) = ( -6.24936163682691E-02,  2.76853289753033E-01)
-
-PATH NUMBER =      5224
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.20884934596014E-02,  1.24256316152991E+00)
-X( 2) = ( -1.56637830551674E-01,  7.53504352913596E-01)
-X( 3) = (  1.16877312591413E+00,  4.13477377989016E-01)
-X( 4) = ( -2.62268628085327E-02, -9.89744007579804E-01)
-
-X( 5) = ( -3.57479987950380E-02,  2.55153056682573E-01)
-
-PATH NUMBER =      5225
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.20322922087034E-01,  1.18675389617231E+00)
-X( 2) = ( -4.95833705690421E-01,  5.33347227119900E-01)
-X( 3) = (  1.24245645173452E+00,  7.46618919438407E-01)
-X( 4) = ( -1.14105406359509E-01, -9.97234626103844E-01)
-
-X( 5) = ( -5.94004049995182E-03,  2.49676032778182E-01)
-
-PATH NUMBER =      5226
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.35891577899837E-01,  9.33016494776308E-01)
-X( 2) = ( -6.14158548324948E-01,  1.46666178496624E-01)
-X( 3) = (  1.08476189891422E+00,  1.04918287491565E+00)
-X( 4) = ( -1.76609399539980E-01, -1.05946001175157E+00)
-
-X( 5) = (  2.33201316327106E-02,  2.58317986335839E-01)
-
-PATH NUMBER =      5227
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.37927491064454E-01,  6.00077507432202E-01)
-X( 2) = ( -4.56246849552416E-01, -2.25606432824239E-01)
-X( 3) = (  7.69476501297568E-01,  1.17959620702913E+00)
-X( 4) = ( -1.84492529286300E-01, -1.14730421502029E+00)
-
-X( 5) = (  4.79310859801117E-02,  2.83353987409669E-01)
-
-PATH NUMBER =      5228
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.25478035184505E-01,  3.43722786522976E-01)
-X( 2) = ( -9.59872482215345E-02, -4.09280114656439E-01)
-X( 3) = (  4.44125800436293E-01,  1.07683706830022E+00)
-X( 4) = ( -1.34066191578935E-01, -1.21966395692099E+00)
-
-X( 5) = (  5.48526277613593E-02,  3.27805572037066E-01)
-
-PATH NUMBER =      5229
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.79506717789192E-02,  2.83903555027425E-01)
-X( 2) = (  2.98050784365491E-01, -3.18411909965098E-01)
-X( 3) = (  2.60945005133653E-01,  7.88987601780787E-01)
-X( 4) = ( -4.89254302574807E-02, -1.24268131002939E+00)
-
-X( 5) = (  1.88618480220602E-02,  3.74097361630930E-01)
-
-PATH NUMBER =      5230
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.10909885066298E-02,  1.76065378332986E-01)
-X( 2) = (  4.22343304852040E-01,  6.54843013070477E-02)
-X( 3) = (  1.48321700240430E-01,  6.25078667676909E-01)
-X( 4) = (  3.26120364322964E-01, -1.01946507834509E+00)
-
-X( 5) = (  5.18945063249469E-02,  4.10154945211091E-01)
-
-PATH NUMBER =      5231
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.86875961254115E-01,  4.88229364599815E-01)
-X( 2) = (  4.01279578659906E-01,  4.69315108932945E-01)
-X( 3) = (  3.99989075281314E-01,  3.94696264956429E-01)
-X( 4) = (  3.63572570166574E-01, -9.39614717920352E-01)
-
-X( 5) = ( -7.63705686097362E-03,  3.69662971131864E-01)
-
-PATH NUMBER =      5232
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.49172536613314E-02,  8.01785997491366E-01)
-X( 2) = (  1.25566388707408E-01,  7.65127952864879E-01)
-X( 3) = (  7.40864423404262E-01,  3.79981775998622E-01)
-X( 4) = (  3.40935802025592E-01, -8.54371979164228E-01)
-
-X( 5) = ( -1.34872064448958E-02,  3.15058313260514E-01)
-
-PATH NUMBER =      5233
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.12398410706623E-01,  9.70018643683876E-01)
-X( 2) = ( -2.75786999215897E-01,  8.14508715833541E-01)
-X( 3) = (  1.01144838081504E+00,  5.87820273720176E-01)
-X( 4) = (  2.68802055292837E-01, -8.03622886908228E-01)
-
-X( 5) = (  7.94678972478470E-03,  2.79488397247471E-01)
-
-PATH NUMBER =      5234
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.40632839334056E-01,  9.14209378326272E-01)
-X( 2) = ( -6.14982874354643E-01,  5.94351590039844E-01)
-X( 3) = (  1.08513170663543E+00,  9.20961815169567E-01)
-X( 4) = (  1.80923511741862E-01, -8.11113505432267E-01)
-
-X( 5) = (  3.82646885237436E-02,  2.62208484662689E-01)
-
-PATH NUMBER =      5235
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.56201495146858E-01,  6.60471976930273E-01)
-X( 2) = ( -7.33307716989170E-01,  2.07670541416569E-01)
-X( 3) = (  9.27437153815124E-01,  1.22352577064681E+00)
-X( 4) = (  1.18419518561390E-01, -8.73338891079998E-01)
-
-X( 5) = (  7.18878591971995E-02,  2.60152178340961E-01)
-
-PATH NUMBER =      5236
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.58237408311475E-01,  3.27532989586166E-01)
-X( 2) = ( -5.75396018216637E-01, -1.64602069904294E-01)
-X( 3) = (  6.12151756198475E-01,  1.35393910276029E+00)
-X( 4) = (  1.10536388815070E-01, -9.61183094348717E-01)
-
-X( 5) = (  1.06228827769273E-01,  2.75225294261989E-01)
-
-PATH NUMBER =      5237
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.45787952431526E-01,  7.11782686769410E-02)
-X( 2) = ( -2.15136416885757E-01, -3.48275751736494E-01)
-X( 3) = (  2.86801055337201E-01,  1.25117996403138E+00)
-X( 4) = (  1.60962726522435E-01, -1.03354283624942E+00)
-
-X( 5) = (  1.32552889114981E-01,  3.14702695170367E-01)
-
-PATH NUMBER =      5238
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.18260589025941E-01,  1.13590371813896E-02)
-X( 2) = (  1.78901615701269E-01, -2.57407547045153E-01)
-X( 3) = (  1.03620260034560E-01,  9.63330497511947E-01)
-X( 4) = (  2.46103487843889E-01, -1.05656018935781E+00)
-
-X( 5) = (  1.22012053610941E-01,  3.77659155283873E-01)
-
-PATH NUMBER =      5239
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.54116484106868E-01, -1.10049559194308E-01)
-X( 2) = (  2.91856897672806E-01,  3.56287452060714E-02)
-X( 3) = ( -8.42614997207013E-02,  6.57506677302245E-01)
-X( 4) = (  4.32489277325260E-01, -6.87247095052771E-01)
-
-X( 5) = (  1.74387167121354E-01,  5.00264251635523E-01)
-
-PATH NUMBER =      5240
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.69901456854353E-01,  2.02114427072521E-01)
-X( 2) = (  2.70793171480672E-01,  4.39459552831968E-01)
-X( 3) = (  1.67405875320183E-01,  4.27124274581765E-01)
-X( 4) = (  4.69941483168870E-01, -6.07396734628029E-01)
-
-X( 5) = (  5.92001606096548E-02,  4.71800815574279E-01)
-
-PATH NUMBER =      5241
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.57942749261570E-01,  5.15671059964072E-01)
-X( 2) = ( -4.92001847182708E-03,  7.35272396763902E-01)
-X( 3) = (  5.08281223443131E-01,  4.12409785623959E-01)
-X( 4) = (  4.47304715027888E-01, -5.22153995871906E-01)
-
-X( 5) = (  2.78385131703017E-02,  3.90034361665409E-01)
-
-PATH NUMBER =      5242
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.29372915106384E-01,  6.83903706156582E-01)
-X( 2) = ( -4.06273406395131E-01,  7.84653159732564E-01)
-X( 3) = (  7.78865180853910E-01,  6.20248283345512E-01)
-X( 4) = (  3.75170968295133E-01, -4.71404903615905E-01)
-
-X( 5) = (  4.69901545778689E-02,  3.31432876937131E-01)
-
-PATH NUMBER =      5243
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.57607343733817E-01,  6.28094440798978E-01)
-X( 2) = ( -7.45469281533878E-01,  5.64496033938868E-01)
-X( 3) = (  8.52548506674300E-01,  9.53389824794903E-01)
-X( 4) = (  2.87292424744158E-01, -4.78895522139945E-01)
-
-X( 5) = (  8.24762642799046E-02,  2.98004710319843E-01)
-
-PATH NUMBER =      5244
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.73175999546620E-01,  3.74357039402979E-01)
-X( 2) = ( -8.63794124168405E-01,  1.77814985315593E-01)
-X( 3) = (  6.94853953853993E-01,  1.25595378027214E+00)
-X( 4) = (  2.24788431563686E-01, -5.41120907787676E-01)
-
-X( 5) = (  1.25107848476266E-01,  2.83285742438569E-01)
-
-PATH NUMBER =      5245
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.75211912711236E-01,  4.14180520588727E-02)
-X( 2) = ( -7.05882425395872E-01, -1.94457626005270E-01)
-X( 3) = (  3.79568556237344E-01,  1.38636711238563E+00)
-X( 4) = (  2.16905301817366E-01, -6.28965111056395E-01)
-
-X( 5) = (  1.73949963210567E-01,  2.87792957455107E-01)
-
-PATH NUMBER =      5246
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.62762456831288E-01, -2.14936668850353E-01)
-X( 2) = ( -3.45622824064991E-01, -3.78131307837471E-01)
-X( 3) = (  5.42178553760691E-02,  1.28360797365672E+00)
-X( 4) = (  2.67331639524731E-01, -7.01324852957096E-01)
-
-X( 5) = (  2.25565804683947E-01,  3.22813443925781E-01)
-
-PATH NUMBER =      5247
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.35235093425702E-01, -2.74755900345904E-01)
-X( 2) = (  4.84152085220342E-02, -2.87263103146130E-01)
-X( 3) = ( -1.28962939926571E-01,  9.95758507137283E-01)
-X( 4) = (  3.52472400846185E-01, -7.24342206065489E-01)
-
-X( 5) = (  2.50378942724378E-01,  4.08081339445112E-01)
-
-PATH NUMBER =      5248
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.01628840437413E-01, -2.75858557320508E-01)
-X( 2) = (  2.11089292092602E-01, -7.11169834086334E-02)
-X( 3) = ( -2.83274890407718E-01,  5.32846374720881E-01)
-X( 4) = (  3.00426988675919E-01, -3.64380735713792E-01)
-
-X( 5) = (  3.24802096226326E-01,  7.67279182738389E-01)
-
-PATH NUMBER =      5249
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.17413813184898E-01,  3.63054289463215E-02)
-X( 2) = (  1.90025565900468E-01,  3.32713824217264E-01)
-X( 3) = ( -3.16075153668343E-02,  3.02463972000401E-01)
-X( 4) = (  3.37879194519530E-01, -2.84530375289051E-01)
-
-X( 5) = (  5.42308852126983E-02,  7.05264163080896E-01)
-
-PATH NUMBER =      5250
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.05455105592115E-01,  3.49862061837872E-01)
-X( 2) = ( -8.56876240520311E-02,  6.28526668149197E-01)
-X( 3) = (  3.09267832756114E-01,  2.87749483042594E-01)
-X( 4) = (  3.15242426378548E-01, -1.99287636532927E-01)
-
-X( 5) = (  8.15110239456603E-03,  5.33558656052543E-01)
-
-PATH NUMBER =      5251
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.18139441224161E-01,  5.18094708030382E-01)
-X( 2) = ( -4.87041011975335E-01,  6.77907431117860E-01)
-X( 3) = (  5.79851790166893E-01,  4.95587980764148E-01)
-X( 4) = (  2.43108679645793E-01, -1.48538544276926E-01)
-
-X( 5) = (  5.04368037945701E-02,  4.32593467240446E-01)
-
-PATH NUMBER =      5252
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.10094987403273E-01,  4.62285442672779E-01)
-X( 2) = ( -8.26236887114082E-01,  4.57750305324163E-01)
-X( 3) = (  6.53535115987283E-01,  8.28729522213539E-01)
-X( 4) = (  1.55230136094818E-01, -1.56029162800966E-01)
-
-X( 5) = (  1.09858346752544E-01,  3.77936939623865E-01)
-
-PATH NUMBER =      5253
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.25663643216075E-01,  2.08548041276779E-01)
-X( 2) = ( -9.44561729748609E-01,  7.10692567008881E-02)
-X( 3) = (  4.95840563166976E-01,  1.13129347769078E+00)
-X( 4) = (  9.27261429143457E-02, -2.18254548448697E-01)
-
-X( 5) = (  1.76853446862252E-01,  3.49804921201100E-01)
-
-PATH NUMBER =      5254
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.27699556380691E-01, -1.24390946067328E-01)
-X( 2) = ( -7.86650030976076E-01, -3.01203354619975E-01)
-X( 3) = (  1.80555165550326E-01,  1.26170680980426E+00)
-X( 4) = (  8.48430131680264E-02, -3.06098751717416E-01)
-
-X( 5) = (  2.56134317495828E-01,  3.45479514855396E-01)
-
-PATH NUMBER =      5255
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.15250100500743E-01, -3.80745666976553E-01)
-X( 2) = ( -4.26390429645196E-01, -4.84877036452176E-01)
-X( 3) = ( -1.44795535310948E-01,  1.15894767107535E+00)
-X( 4) = (  1.35269350875391E-01, -3.78458493618118E-01)
-
-X( 5) = (  3.54993609658041E-01,  3.83201782946265E-01)
-
-PATH NUMBER =      5256
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.12277262904843E-01, -4.40564898472104E-01)
-X( 2) = ( -3.23523970581698E-02, -3.94008831760834E-01)
-X( 3) = ( -3.27976330613588E-01,  8.71098204555918E-01)
-X( 4) = (  2.20410112196845E-01, -4.01475846726510E-01)
-
-X( 5) = (  4.47397481701295E-01,  5.25704480943919E-01)
-
-PATH NUMBER =      5257
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.97814275177772E-01, -2.43777743060614E-01)
-X( 2) = (  2.17832548394355E-01, -2.04805371771619E-01)
-X( 3) = ( -3.55597894530698E-01,  3.09427700955575E-01)
-X( 4) = ( -8.27308905717925E-03, -2.01938758122756E-01)
-
-X( 5) = ( -1.78129428194704E-01,  1.43738877600379E+00)
-
-PATH NUMBER =      5258
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.13599247925257E-01,  6.83862432062151E-02)
-X( 2) = (  1.96768822202221E-01,  1.99025435854278E-01)
-X( 3) = ( -1.03930519489814E-01,  7.90452982350953E-02)
-X( 4) = (  2.91791167864314E-02, -1.22088397698014E-01)
-
-X( 5) = ( -3.77689391548995E-01,  8.40980700736846E-01)
-
-PATH NUMBER =      5259
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.01640540332473E-01,  3.81942876097766E-01)
-X( 2) = ( -7.89443677502777E-02,  4.94838279786212E-01)
-X( 3) = (  2.36944828633134E-01,  6.43308092772888E-02)
-X( 4) = (  6.54234864544905E-03, -3.68456589418905E-02)
-
-X( 5) = ( -2.19496338259970E-01,  6.08754538034817E-01)
-
-PATH NUMBER =      5260
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14324875964519E-01,  5.50175522290276E-01)
-X( 2) = ( -4.80297755673582E-01,  5.44219042754874E-01)
-X( 3) = (  5.07528786043913E-01,  2.72169306998842E-01)
-X( 4) = ( -6.55913980873059E-02,  1.39034333141103E-02)
-
-X( 5) = ( -8.09472267447406E-02,  5.24988240532610E-01)
-
-PATH NUMBER =      5261
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.60904473370858E-02,  4.94366256932672E-01)
-X( 2) = ( -8.19493630812328E-01,  3.24061916961178E-01)
-X( 3) = (  5.81212111864304E-01,  6.05310848448233E-01)
-X( 4) = ( -1.53469941638281E-01,  6.41281479007030E-03)
-
-X( 5) = (  3.81149506313400E-02,  4.92164095164333E-01)
-
-PATH NUMBER =      5262
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.29478208475717E-01,  2.40628855536673E-01)
-X( 2) = ( -9.37818473446855E-01, -6.26191316620977E-02)
-X( 3) = (  4.23517559043996E-01,  9.07874803925474E-01)
-X( 4) = ( -2.15973934818753E-01, -5.58125708576604E-02)
-
-X( 5) = (  1.57227613212241E-01,  4.87922936738978E-01)
-
-PATH NUMBER =      5263
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.31514121640333E-01, -9.23101318074339E-02)
-X( 2) = ( -7.79906774674322E-01, -4.34891742982961E-01)
-X( 3) = (  1.08232161427347E-01,  1.03828813603896E+00)
-X( 4) = ( -2.23857064565073E-01, -1.43656774126379E-01)
-
-X( 5) = (  2.98392541075407E-01,  5.19228271611827E-01)
-
-PATH NUMBER =      5264
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.09353342396152E-02, -3.48664852716660E-01)
-X( 2) = ( -4.19647173343442E-01, -6.18565424815162E-01)
-X( 3) = ( -2.17118539433928E-01,  9.35528997310047E-01)
-X( 4) = ( -1.73430726857708E-01, -2.16016516027081E-01)
-
-X( 5) = (  4.89451243296541E-01,  6.43895800252740E-01)
-
-PATH NUMBER =      5265
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.08462697645201E-01, -4.08484084212211E-01)
-X( 2) = ( -2.56091407564164E-02, -5.27697220123820E-01)
-X( 3) = ( -4.00299334736568E-01,  6.47679530790613E-01)
-X( 4) = ( -8.82899655362536E-02, -2.39033869135474E-01)
-
-X( 5) = (  6.27040235136317E-01,  1.10947074547685E+00)
-
-PATH NUMBER =      5266
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.60213187397711E-01, -7.63655944637610E-02)
-X( 2) = (  3.22726939995304E-01, -4.51172544533678E-03)
-X( 3) = ( -7.20437295489398E-01, -1.80156986219218E-01)
-X( 4) = ( -1.47526557927529E-01, -1.08329763645006E-01)
-
-X( 5) = (  5.05358150199688E-01,  2.01055480514732E+00)
-
-PATH NUMBER =      5267
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.75998160145196E-01,  2.35798391803068E-01)
-X( 2) = (  3.01663213803170E-01,  3.99319082180561E-01)
-X( 3) = ( -4.68769920448514E-01, -4.10539388939698E-01)
-X( 4) = ( -1.10074352083918E-01, -2.84794032202641E-02)
-
-X( 5) = ( -3.69462917858298E-01,  1.17935122932600E+00)
-
-PATH NUMBER =      5268
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.64039452552413E-01,  5.49355024694619E-01)
-X( 2) = (  2.59500238506714E-02,  6.95131926112494E-01)
-X( 3) = ( -1.27894572325566E-01, -4.25253877897505E-01)
-X( 4) = ( -1.32711120224901E-01,  5.67633355358595E-02)
-
-X( 5) = ( -1.97093791747957E-01,  7.57560716663606E-01)
-
-PATH NUMBER =      5269
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.76723788184459E-01,  7.17587670887129E-01)
-X( 2) = ( -3.75403364072633E-01,  7.44512689081156E-01)
-X( 3) = (  1.42689385085213E-01, -2.17415380175952E-01)
-X( 4) = ( -2.04844866957656E-01,  1.07512427791860E-01)
-
-X( 5) = ( -3.11680007911337E-02,  6.06965538074589E-01)
-
-PATH NUMBER =      5270
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.48489359557025E-01,  6.61778405529525E-01)
-X( 2) = ( -7.14599239211380E-01,  5.24355563287460E-01)
-X( 3) = (  2.16372710905604E-01,  1.15726161273440E-01)
-X( 4) = ( -2.92723410508631E-01,  1.00021809267820E-01)
-
-X( 5) = (  1.06271339274438E-01,  5.33664120663693E-01)
-
-PATH NUMBER =      5271
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.29207037442231E-02,  4.08041004133526E-01)
-X( 2) = ( -8.32924081845906E-01,  1.37674514664185E-01)
-X( 3) = (  5.86781580852967E-02,  4.18290116750680E-01)
-X( 4) = ( -3.55227403689103E-01,  3.77964236200898E-02)
-
-X( 5) = (  2.40572785626816E-01,  4.92482929610638E-01)
-
-PATH NUMBER =      5272
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.08847905796065E-02,  7.51020167894192E-02)
-X( 2) = ( -6.75012383073374E-01, -2.34598096656679E-01)
-X( 3) = ( -2.56607239531352E-01,  5.48703448864165E-01)
-X( 4) = ( -3.63110533435423E-01, -5.00477796486294E-02)
-
-X( 5) = (  4.00329773193393E-01,  4.76138303396015E-01)
-
-PATH NUMBER =      5273
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.43334246459555E-01, -1.81252704119807E-01)
-X( 2) = ( -3.14752781742493E-01, -4.18271778488879E-01)
-X( 3) = ( -5.81957940392627E-01,  4.45944310135254E-01)
-X( 4) = ( -3.12684195728058E-01, -1.22407521549331E-01)
-
-X( 5) = (  6.37186342119606E-01,  5.14020118744942E-01)
-
-PATH NUMBER =      5274
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.70861609865141E-01, -2.41071935615357E-01)
-X( 2) = (  7.92852508445327E-02, -3.27403573797538E-01)
-X( 3) = ( -7.65138735695267E-01,  1.58094843615820E-01)
-X( 4) = ( -2.27543434406603E-01, -1.45424874657724E-01)
-
-X( 5) = (  1.04476203078072E+00,  8.26751795041598E-01)
-
-PATH NUMBER =      5275
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.80051813785774E-01,  2.20890892932137E-01)
-X( 2) = (  4.55555255511220E-01, -2.10856593732828E-02)
-X( 3) = ( -5.12971611266973E-01, -2.90177486956770E-01)
-X( 4) = ( -3.61105882817809E-01, -3.84132240166736E-01)
-
-X( 5) = ( -3.78483351140726E-01,  9.06673408661906E-01)
-
-PATH NUMBER =      5276
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.95836786533260E-01,  5.33054879198966E-01)
-X( 2) = (  4.34491529319086E-01,  3.82745148252614E-01)
-X( 3) = ( -2.61304236226089E-01, -5.20559889677250E-01)
-X( 4) = ( -3.23653676974199E-01, -3.04281879741994E-01)
-
-X( 5) = ( -3.55964503988851E-01,  5.88997624539704E-01)
-
-PATH NUMBER =      5277
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.83878078940475E-01,  8.46611512090516E-01)
-X( 2) = (  1.58778339366586E-01,  6.78557992184548E-01)
-X( 3) = (  7.95711118968590E-02, -5.35274378635057E-01)
-X( 4) = ( -3.46290445115181E-01, -2.19039140985871E-01)
-
-X( 5) = ( -2.30437020375889E-01,  4.73380515334554E-01)
-
-PATH NUMBER =      5278
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.96562414572522E-01,  1.01484415828303E+00)
-X( 2) = ( -2.42575048556718E-01,  7.27938755153210E-01)
-X( 3) = (  3.50155069307638E-01, -3.27435880913504E-01)
-X( 4) = ( -4.18424191847936E-01, -1.68290048729870E-01)
-
-X( 5) = ( -1.23129211132611E-01,  4.38302182231630E-01)
-
-PATH NUMBER =      5279
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.68327985945089E-01,  9.59034892925423E-01)
-X( 2) = ( -5.81770923695464E-01,  5.07781629359514E-01)
-X( 3) = (  4.23838395128029E-01,  5.70566053588725E-03)
-X( 4) = ( -5.06302735398912E-01, -1.75780667253910E-01)
-
-X( 5) = ( -2.90317068389554E-02,  4.37866406596604E-01)
-
-PATH NUMBER =      5280
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.27593301322865E-02,  7.05297491529424E-01)
-X( 2) = ( -7.00095766329991E-01,  1.21100580736238E-01)
-X( 3) = (  2.66143842307722E-01,  3.08269616013128E-01)
-X( 4) = ( -5.68806728579384E-01, -2.38006052901641E-01)
-
-X( 5) = (  6.41228718945238E-02,  4.64913465783174E-01)
-
-PATH NUMBER =      5281
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.07234169676696E-02,  3.72358504185317E-01)
-X( 2) = ( -5.42184067557458E-01, -2.51172030584625E-01)
-X( 3) = ( -4.91415553089270E-02,  4.38682948126613E-01)
-X( 4) = ( -5.76689858325704E-01, -3.25850256170360E-01)
-
-X( 5) = (  1.65472638756113E-01,  5.36560639796049E-01)
-
-PATH NUMBER =      5282
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.63172872847618E-01,  1.16003783276091E-01)
-X( 2) = ( -1.81924466226577E-01, -4.34845712416826E-01)
-X( 3) = ( -3.74492256170202E-01,  3.35923809397702E-01)
-X( 4) = ( -5.26263520618339E-01, -3.98209998071062E-01)
-
-X( 5) = (  2.55214034597743E-01,  7.16615564977337E-01)
-
-PATH NUMBER =      5283
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.90700236253204E-01,  5.61845517805403E-02)
-X( 2) = (  2.12113566360448E-01, -3.43977507725484E-01)
-X( 3) = ( -5.57673051472842E-01,  4.80743428782680E-02)
-X( 4) = ( -4.41122759296884E-01, -4.21227351179455E-01)
-
-X( 5) = (  8.92054101068604E-02,  1.05949266466300E+00)
-
-PATH NUMBER =      5284
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.04176296292437E-01,  4.61354596518278E-01)
-X( 2) = (  5.67961167873689E-01,  5.15983660697579E-02)
-X( 3) = ( -2.83323862044900E-01, -2.41101708922624E-01)
-X( 4) = ( -3.47434723186080E-01, -7.32695338429350E-01)
-
-X( 5) = ( -1.66467425699399E-01,  5.65216540046244E-01)
-
-PATH NUMBER =      5285
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.19961269039922E-01,  7.73518582785107E-01)
-X( 2) = (  5.46897441681554E-01,  4.55429173695655E-01)
-X( 3) = ( -3.16564870040162E-02, -4.71484111643104E-01)
-X( 4) = ( -3.09982517342470E-01, -6.52844978004608E-01)
-
-X( 5) = ( -1.89049576337129E-01,  4.35427295852763E-01)
-
-PATH NUMBER =      5286
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.08002561447138E-01,  1.08707521567666E+00)
-X( 2) = (  2.71184251729055E-01,  7.51242017627589E-01)
-X( 3) = (  3.09218861118932E-01, -4.86198600600911E-01)
-X( 4) = ( -3.32619285483452E-01, -5.67602239248484E-01)
-
-X( 5) = ( -1.39466301520311E-01,  3.63803295871240E-01)
-
-PATH NUMBER =      5287
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.20686897079185E-01,  1.25530786186917E+00)
-X( 2) = ( -1.30169136194249E-01,  8.00622780596251E-01)
-X( 3) = (  5.79802818529711E-01, -2.78360102879358E-01)
-X( 4) = ( -4.04753032216207E-01, -5.16853146992483E-01)
-
-X( 5) = ( -8.18711159438264E-02,  3.36807998705249E-01)
-
-PATH NUMBER =      5288
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.24524684517517E-02,  1.19949859651156E+00)
-X( 2) = ( -4.69365011332995E-01,  5.80465654802555E-01)
-X( 3) = (  6.53486144350102E-01,  5.47814385700330E-02)
-X( 4) = ( -4.92631575767182E-01, -5.24343765516523E-01)
-
-X( 5) = ( -2.69605693064395E-02,  3.35378321986796E-01)
-
-PATH NUMBER =      5289
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.23116187361051E-01,  9.45761195115565E-01)
-X( 2) = ( -5.87689853967523E-01,  1.93784606179279E-01)
-X( 3) = (  4.95791591529794E-01,  3.57345394047274E-01)
-X( 4) = ( -5.55135568947655E-01, -5.86569151164254E-01)
-
-X( 5) = (  2.58577879678469E-02,  3.55319696761017E-01)
-
-PATH NUMBER =      5290
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.25152100525667E-01,  6.12822207771459E-01)
-X( 2) = ( -4.29778155194990E-01, -1.78488005141584E-01)
-X( 3) = (  1.80506193913146E-01,  4.87758726160759E-01)
-X( 4) = ( -5.63018698693975E-01, -6.74413354432973E-01)
-
-X( 5) = (  7.40633484950839E-02,  4.04749192764867E-01)
-
-PATH NUMBER =      5291
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.72973553542810E-02,  3.56467486862233E-01)
-X( 2) = ( -6.95185538641087E-02, -3.62161686973785E-01)
-X( 3) = ( -1.44844506948130E-01,  3.84999587431847E-01)
-X( 4) = ( -5.12592360986609E-01, -7.46773096333675E-01)
-
-X( 5) = (  9.21191519039290E-02,  5.02000536785878E-01)
-
-PATH NUMBER =      5292
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14824718759867E-01,  2.96648255366682E-01)
-X( 2) = (  3.24519478722917E-01, -2.71293482282443E-01)
-X( 3) = ( -3.28025302250770E-01,  9.71501209124138E-02)
-X( 4) = ( -4.27451599665155E-01, -7.69790449442068E-01)
-
-X( 5) = ( -3.21031233046416E-03,  6.15004306789723E-01)
-
-PATH NUMBER =      5293
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.14880744191483E-01,  5.32509876930326E-01)
-X( 2) = (  6.07348701435749E-01,  1.79530687586023E-01)
-X( 3) = ( -1.38948781934626E-01, -5.58927540754764E-02)
-X( 4) = ( -1.12909966562043E-01, -9.90922510908436E-01)
-
-X( 5) = ( -2.11526264979195E-02,  4.51126219049719E-01)
-
-PATH NUMBER =      5294
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.30665716938968E-01,  8.44673863197155E-01)
-X( 2) = (  5.86284975243615E-01,  5.83361495211921E-01)
-X( 3) = (  1.12718593106258E-01, -2.86275156795957E-01)
-X( 4) = ( -7.54577607184317E-02, -9.11072150483694E-01)
-
-X( 5) = ( -7.07648570814175E-02,  3.84407745683704E-01)
-
-PATH NUMBER =      5295
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.18707009346185E-01,  1.15823049608871E+00)
-X( 2) = (  3.10571785291116E-01,  8.79174339143854E-01)
-X( 3) = (  4.53593941229205E-01, -3.00989645753763E-01)
-X( 4) = ( -9.80945288594144E-02, -8.25829411727571E-01)
-
-X( 5) = ( -5.91634082269648E-02,  3.24754601961809E-01)
-
-PATH NUMBER =      5296
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.31391344978230E-01,  1.32646314228122E+00)
-X( 2) = ( -9.07816026321889E-02,  9.28555102112516E-01)
-X( 3) = (  7.24177898639985E-01, -9.31511480322102E-02)
-X( 4) = ( -1.70228275592169E-01, -7.75080319471570E-01)
-
-X( 5) = ( -2.64275338764867E-02,  2.92844193078687E-01)
-
-PATH NUMBER =      5297
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.96843083649202E-01,  1.27065387692361E+00)
-X( 2) = ( -4.29977477770935E-01,  7.08397976318821E-01)
-X( 3) = (  7.97861224460376E-01,  2.39990393417181E-01)
-X( 4) = ( -2.58106819143145E-01, -7.82570937995610E-01)
-
-X( 5) = (  1.09259154632684E-02,  2.81555452960525E-01)
-
-PATH NUMBER =      5298
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.12411739462005E-01,  1.01691647552761E+00)
-X( 2) = ( -5.48302320405462E-01,  3.21716927695545E-01)
-X( 3) = (  6.40166671640068E-01,  5.42554348894422E-01)
-X( 4) = ( -3.20610812323617E-01, -8.44796323643341E-01)
-
-X( 5) = (  4.91824223187643E-02,  2.87142162586393E-01)
-
-PATH NUMBER =      5299
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.14447652626622E-01,  6.83977488183506E-01)
-X( 2) = ( -3.90390621632930E-01, -5.05556836253187E-02)
-X( 3) = (  3.24881274023419E-01,  6.72967681007907E-01)
-X( 4) = ( -3.28493942069936E-01, -9.32640526912060E-01)
-
-X( 5) = (  8.55262052818113E-02,  3.12817229940411E-01)
-
-PATH NUMBER =      5300
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.01998196746673E-01,  4.27622767274280E-01)
-X( 2) = ( -3.01310203020485E-02, -2.34229365457519E-01)
-X( 3) = ( -4.69426837855820E-04,  5.70208542278995E-01)
-X( 4) = ( -2.78067604362572E-01, -1.00500026881276E+00)
-
-X( 5) = (  1.06688773182529E-01,  3.67266091690720E-01)
-
-PATH NUMBER =      5301
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.25529166658913E-01,  3.67803535778729E-01)
-X( 2) = (  3.63907012284977E-01, -1.43361160766178E-01)
-X( 3) = ( -1.83650222140496E-01,  2.82359075759561E-01)
-X( 4) = ( -1.92926843041117E-01, -1.02801762192115E+00)
-
-X( 5) = (  7.31950266545058E-02,  4.40372771957943E-01)
-
-PATH NUMBER =      5302
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.47529761472875E-01,  4.01062387660628E-01)
-X( 2) = (  5.55287991500037E-01,  3.02850350128674E-01)
-X( 3) = ( -1.47401075470034E-01,  1.78788049243440E-01)
-X( 4) = (  2.32731646977578E-01, -1.03798639372568E+00)
-
-X( 5) = (  9.08549149789480E-02,  3.92629621248667E-01)
-
-PATH NUMBER =      5303
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.63314734220360E-01,  7.13226373927457E-01)
-X( 2) = (  5.34224265307903E-01,  7.06681157754571E-01)
-X( 3) = (  1.04266299570850E-01, -5.15943534770401E-02)
-X( 4) = (  2.70183852821189E-01, -9.58136033300942E-01)
-
-X( 5) = (  2.68421626857766E-02,  3.65431363303634E-01)
-
-PATH NUMBER =      5304
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.51356026627577E-01,  1.02678300681901E+00)
-X( 2) = (  2.58511075355404E-01,  1.00249400168650E+00)
-X( 3) = (  4.45141647693797E-01, -6.63088424348467E-02)
-X( 4) = (  2.47547084680206E-01, -8.72893294544818E-01)
-
-X( 5) = (  1.18211632411139E-02,  3.13426987341653E-01)
-
-PATH NUMBER =      5305
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.35959637740377E-01,  1.19501565301152E+00)
-X( 2) = ( -1.42842312567900E-01,  1.05187476465517E+00)
-X( 3) = (  7.15725605104577E-01,  1.41529655286706E-01)
-X( 4) = (  1.75413337947451E-01, -8.22144202288817E-01)
-
-X( 5) = (  2.74185109150353E-02,  2.75601273573426E-01)
-
-PATH NUMBER =      5306
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.64194066367810E-01,  1.13920638765391E+00)
-X( 2) = ( -4.82038187706646E-01,  8.31717638861470E-01)
-X( 3) = (  7.89408930924967E-01,  4.74671196736097E-01)
-X( 4) = (  8.75347943964757E-02, -8.29634820812857E-01)
-
-X( 5) = (  5.44018451572885E-02,  2.54912418904193E-01)
-
-PATH NUMBER =      5307
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.79762722180613E-01,  8.85468986257915E-01)
-X( 2) = ( -6.00363030341174E-01,  4.45036590238195E-01)
-X( 3) = (  6.31714378104660E-01,  7.77235152213338E-01)
-X( 4) = (  2.50308012160035E-02, -8.91860206460589E-01)
-
-X( 5) = (  8.61432184188217E-02,  2.48803256106397E-01)
-
-PATH NUMBER =      5308
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.81798635345229E-01,  5.52529998913807E-01)
-X( 2) = ( -4.42451331568641E-01,  7.27639789173320E-02)
-X( 3) = (  3.16428980488012E-01,  9.07648484326822E-01)
-X( 4) = (  1.71476714696836E-02, -9.79704409729307E-01)
-
-X( 5) = (  1.20100706800284E-01,  2.58700827109629E-01)
-
-PATH NUMBER =      5309
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.69349179465281E-01,  2.96175278004582E-01)
-X( 2) = ( -8.21917302377601E-02, -1.10909702914869E-01)
-X( 3) = ( -8.92172037326368E-03,  8.04889345597912E-01)
-X( 4) = (  6.75740091770489E-02, -1.05206415163001E+00)
-
-X( 5) = (  1.49427980925803E-01,  2.91510294348037E-01)
-
-PATH NUMBER =      5310
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.41821816059695E-01,  2.36356046509031E-01)
-X( 2) = (  3.11846302349266E-01, -2.00414982235271E-02)
-X( 3) = ( -1.92102515675904E-01,  5.17039879078478E-01)
-X( 4) = (  1.52714770498503E-01, -1.07508150473840E+00)
-
-X( 5) = (  1.49420107290125E-01,  3.50264057362715E-01)
-
-PATH NUMBER =      5311
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.72198442258543E-02,  1.28517869814592E-01)
-X( 2) = (  4.36138822835815E-01,  3.63854713048619E-01)
-X( 3) = ( -3.04725820569127E-01,  3.53130944974600E-01)
-X( 4) = (  5.27760565078947E-01, -8.51865273054107E-01)
-
-X( 5) = (  1.98072120309632E-01,  3.54801895442089E-01)
-
-PATH NUMBER =      5312
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.43004816973339E-01,  4.40681856081422E-01)
-X( 2) = (  4.15075096643681E-01,  7.67685520674516E-01)
-X( 3) = ( -5.30584455282433E-02,  1.22748542254120E-01)
-X( 4) = (  5.65212770922558E-01, -7.72014912629366E-01)
-
-X( 5) = (  1.24949484315613E-01,  3.64854026004705E-01)
-
-PATH NUMBER =      5313
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.10461093805557E-02,  7.54238488972972E-01)
-X( 2) = (  1.39361906691182E-01,  1.06349836460645E+00)
-X( 3) = (  2.87816902594705E-01,  1.08034053296313E-01)
-X( 4) = (  5.42576002781576E-01, -6.86772173873242E-01)
-
-X( 5) = (  8.36566708268230E-02,  3.20977655779113E-01)
-
-PATH NUMBER =      5314
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.56269554987398E-01,  9.22471135165483E-01)
-X( 2) = ( -2.61991481232122E-01,  1.11287912757511E+00)
-X( 3) = (  5.58400860005484E-01,  3.15872551017867E-01)
-X( 4) = (  4.70442256048821E-01, -6.36023081617242E-01)
-
-X( 5) = (  8.28215432782997E-02,  2.75970548918551E-01)
-
-PATH NUMBER =      5315
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.84503983614831E-01,  8.66661869807879E-01)
-X( 2) = ( -6.01187356370868E-01,  8.92722001781416E-01)
-X( 3) = (  6.32084185825875E-01,  6.49014092467257E-01)
-X( 4) = (  3.82563712497845E-01, -6.43513700141282E-01)
-
-X( 5) = (  1.01402296232644E-01,  2.45135025650748E-01)
-
-PATH NUMBER =      5316
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.00072639427634E-01,  6.12924468411880E-01)
-X( 2) = ( -7.19512199005395E-01,  5.06040953158140E-01)
-X( 3) = (  4.74389633005568E-01,  9.51578047944498E-01)
-X( 4) = (  3.20059719317373E-01, -7.05739085789013E-01)
-
-X( 5) = (  1.29229513252081E-01,  2.27895925796187E-01)
-
-PATH NUMBER =      5317
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.02108552592251E-01,  2.79985481067773E-01)
-X( 2) = ( -5.61600500232863E-01,  1.33768341837277E-01)
-X( 3) = (  1.59104235388919E-01,  1.08199138005798E+00)
-X( 4) = (  3.12176589571054E-01, -7.93583289057732E-01)
-
-X( 5) = (  1.63363735644634E-01,  2.24716246709958E-01)
-
-PATH NUMBER =      5318
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.89659096712302E-01,  2.36307601585472E-02)
-X( 2) = ( -2.01340898901982E-01, -4.99053399949236E-02)
-X( 3) = ( -1.66246465472356E-01,  9.79232241329072E-01)
-X( 4) = (  3.62602927278419E-01, -8.65943030958433E-01)
-
-X( 5) = (  2.00777716632442E-01,  2.41788895575624E-01)
-
-PATH NUMBER =      5319
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.62131733306716E-01, -3.61884713370040E-02)
-X( 2) = (  1.92697133685044E-01,  4.09628646964177E-02)
-X( 3) = ( -3.49427260774997E-01,  6.91382774809638E-01)
-X( 4) = (  4.47743688599873E-01, -8.88960384066826E-01)
-
-X( 5) = (  2.25775116531406E-01,  2.90126103919972E-01)
-
-PATH NUMBER =      5320
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10245339826093E-01, -1.57597067712702E-01)
-X( 2) = (  3.05652415656580E-01,  3.33999156947642E-01)
-X( 3) = ( -5.37309020530259E-01,  3.85558954599937E-01)
-X( 4) = (  6.34129478081243E-01, -5.19647289761785E-01)
-
-X( 5) = (  3.26470954860457E-01,  3.29522498556468E-01)
-
-PATH NUMBER =      5321
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.26030312573578E-01,  1.54566918554128E-01)
-X( 2) = (  2.84588689464446E-01,  7.37829964573540E-01)
-X( 3) = ( -2.85641645489375E-01,  1.55176551879457E-01)
-X( 4) = (  6.71581683924854E-01, -4.39796929337043E-01)
-
-X( 5) = (  2.45785020845771E-01,  3.89712834847725E-01)
-
-PATH NUMBER =      5322
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.14071604980794E-01,  4.68123551445678E-01)
-X( 2) = (  8.87549951194765E-03,  1.03364280850547E+00)
-X( 3) = (  5.52337026335729E-02,  1.40462062921650E-01)
-X( 4) = (  6.48944915783871E-01, -3.54554190580920E-01)
-
-X( 5) = (  1.67083160654628E-01,  3.56471111743450E-01)
-
-PATH NUMBER =      5323
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.73244059387160E-01,  6.36356197638189E-01)
-X( 2) = ( -3.92477888411357E-01,  1.08302357147414E+00)
-X( 3) = (  3.25817660044352E-01,  3.48300560643203E-01)
-X( 4) = (  5.76811169051117E-01, -3.03805098324919E-01)
-
-X( 5) = (  1.45224725389516E-01,  2.98865260563820E-01)
-
-PATH NUMBER =      5324
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.01478488014593E-01,  5.80546932280585E-01)
-X( 2) = ( -7.31673763550103E-01,  8.62866445680439E-01)
-X( 3) = (  3.99500985864744E-01,  6.81442102092594E-01)
-X( 4) = (  4.88932625500142E-01, -3.11295716848959E-01)
-
-X( 5) = (  1.55536637763281E-01,  2.53478557309804E-01)
-
-PATH NUMBER =      5325
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.17047143827395E-01,  3.26809530884585E-01)
-X( 2) = ( -8.49998606184630E-01,  4.76185397057164E-01)
-X( 3) = (  2.41806433044436E-01,  9.84006057569835E-01)
-X( 4) = (  4.26428632319669E-01, -3.73521102496690E-01)
-
-X( 5) = (  1.81135732586938E-01,  2.22498778098769E-01)
-
-PATH NUMBER =      5326
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.19083056992012E-01, -6.12945645952186E-03)
-X( 2) = ( -6.92086907412097E-01,  1.03912785736300E-01)
-X( 3) = ( -7.34789645722134E-02,  1.11441938968332E+00)
-X( 4) = (  4.18545502573350E-01, -4.61365305765409E-01)
-
-X( 5) = (  2.17570985938541E-01,  2.05044548329381E-01)
-
-PATH NUMBER =      5327
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.06633601112064E-01, -2.62484177368748E-01)
-X( 2) = ( -3.31827306081217E-01, -7.97608960959002E-02)
-X( 3) = ( -3.98829665433488E-01,  1.01166025095441E+00)
-X( 4) = (  4.68971840280715E-01, -5.33725047666110E-01)
-
-X( 5) = (  2.64821381971170E-01,  2.06253070157091E-01)
-
-PATH NUMBER =      5328
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.79106237706478E-01, -3.22303408864298E-01)
-X( 2) = (  6.22107265058088E-02,  1.11073085954414E-02)
-X( 3) = ( -5.82010460736129E-01,  7.23810784434975E-01)
-X( 4) = (  5.54112601602169E-01, -5.56742400774503E-01)
-
-X( 5) = (  3.15984038198327E-01,  2.43058943463936E-01)
-
-PATH NUMBER =      5329
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.57757696156638E-01, -3.23406065838902E-01)
-X( 2) = (  2.24884810076376E-01,  2.27253428332938E-01)
-X( 3) = ( -7.36322411217276E-01,  2.60898652018572E-01)
-X( 4) = (  5.02067189431903E-01, -1.96780930422806E-01)
-
-X( 5) = (  5.26583789205744E-01,  3.29869120622394E-01)
-
-PATH NUMBER =      5330
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.73542668904123E-01, -1.12420795720723E-02)
-X( 2) = (  2.03821083884242E-01,  6.31084235958835E-01)
-X( 3) = ( -4.84655036176392E-01,  3.05162492980919E-02)
-X( 4) = (  5.39519395275514E-01, -1.16930569998064E-01)
-
-X( 5) = (  4.27155717317911E-01,  4.92788771341295E-01)
-
-PATH NUMBER =      5331
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.61583961311339E-01,  3.02314553319478E-01)
-X( 2) = ( -7.18921060682565E-02,  9.26897079890769E-01)
-X( 3) = ( -1.43779688053445E-01,  1.58017603402853E-02)
-X( 4) = (  5.16882627134532E-01, -3.16878312419411E-02)
-
-X( 5) = (  2.65033262805649E-01,  4.65194285194010E-01)
-
-PATH NUMBER =      5332
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.42682969433854E-02,  4.70547199511988E-01)
-X( 2) = ( -4.73245493991561E-01,  9.76277842859431E-01)
-X( 3) = (  1.26804269357335E-01,  2.23640258061838E-01)
-X( 4) = (  4.44748880401777E-01,  1.90612610140598E-02)
-
-X( 5) = (  2.12416036202905E-01,  3.71081812117977E-01)
-
-PATH NUMBER =      5333
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.53966131684048E-01,  4.14737934154385E-01)
-X( 2) = ( -8.12441369130307E-01,  7.56120717065735E-01)
-X( 3) = (  2.00487595177726E-01,  5.56781799511230E-01)
-X( 4) = (  3.56870336850802E-01,  1.15706424900197E-02)
-
-X( 5) = (  2.17861246053281E-01,  2.97088469709861E-01)
-
-PATH NUMBER =      5334
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.69534787496850E-01,  1.61000532758385E-01)
-X( 2) = ( -9.30766211764834E-01,  3.69439668442459E-01)
-X( 3) = (  4.27930423574186E-02,  8.59345754988470E-01)
-X( 4) = (  2.94366343670329E-01, -5.06547431577109E-02)
-
-X( 5) = (  2.46793326373012E-01,  2.44240297609378E-01)
-
-PATH NUMBER =      5335
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.71570700661467E-01, -1.71938454585721E-01)
-X( 2) = ( -7.72854512992301E-01, -2.83294287840402E-03)
-X( 3) = ( -2.72492355259230E-01,  9.89759087101955E-01)
-X( 4) = (  2.86483213924010E-01, -1.38498946426430E-01)
-
-X( 5) = (  2.91790751928375E-01,  2.06865404064854E-01)
-
-PATH NUMBER =      5336
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.59121244781519E-01, -4.28293175494947E-01)
-X( 2) = ( -4.12594911661421E-01, -1.86506624710605E-01)
-X( 3) = ( -5.97843056120505E-01,  8.86999948373044E-01)
-X( 4) = (  3.36909551631375E-01, -2.10858688327132E-01)
-
-X( 5) = (  3.56815584452331E-01,  1.87339364585807E-01)
-
-PATH NUMBER =      5337
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.84061186240674E-02, -4.88112406990498E-01)
-X( 2) = ( -1.85568790743952E-02, -9.56384200192632E-02)
-X( 3) = ( -7.81023851423146E-01,  5.99150481853611E-01)
-X( 4) = (  4.22050312952829E-01, -2.33876041435524E-01)
-
-X( 5) = (  4.48282957591207E-01,  2.08231480649631E-01)
-
-PATH NUMBER =      5338
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.53943130896996E-01, -2.91325251579008E-01)
-X( 2) = (  2.31628066378130E-01,  9.35650399699525E-02)
-X( 3) = ( -8.08645415340256E-01,  3.74799782532663E-02)
-X( 4) = (  1.93367111698805E-01, -3.43389528317697E-02)
-
-X( 5) = (  9.58222520779978E-01,  5.13088020483783E-01)
-
-PATH NUMBER =      5339
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.69728103644481E-01,  2.08387346878215E-02)
-X( 2) = (  2.10564340185996E-01,  4.97395847595849E-01)
-X( 3) = ( -5.56978040299372E-01, -1.92902424467214E-01)
-X( 4) = (  2.30819317542415E-01,  4.55114075929721E-02)
-
-X( 5) = (  6.02527849578567E-01,  9.85516374247590E-01)
-
-PATH NUMBER =      5340
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.57769396051697E-01,  3.34395367579372E-01)
-X( 2) = ( -6.51488497665032E-02,  7.93208691527783E-01)
-X( 3) = ( -2.16102692176424E-01, -2.07616913425020E-01)
-X( 4) = (  2.08182549401433E-01,  1.30754146349096E-01)
-
-X( 5) = (  2.34582530080731E-01,  7.58873537562522E-01)
-
-PATH NUMBER =      5341
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.70453731683744E-01,  5.02628013771882E-01)
-X( 2) = ( -4.66502237689807E-01,  8.42589454496446E-01)
-X( 3) = (  5.44812652343549E-02,  2.21584296532516E-04)
-X( 4) = (  1.36048802668678E-01,  1.81503238605097E-01)
-
-X( 5) = (  2.05631566922731E-01,  5.43434032430772E-01)
-
-PATH NUMBER =      5342
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.22193030563102E-02,  4.46818748414278E-01)
-X( 2) = ( -8.05698112828554E-01,  6.22432328702749E-01)
-X( 3) = (  1.28164591054746E-01,  3.33363125745924E-01)
-X( 4) = (  4.81702591177028E-02,  1.74012620081057E-01)
-
-X( 5) = (  2.48421559939614E-01,  4.17543838779149E-01)
-
-PATH NUMBER =      5343
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.73349352756492E-01,  1.93081347018279E-01)
-X( 2) = ( -9.24022955463081E-01,  2.35751280079474E-01)
-X( 3) = ( -2.95299617655613E-02,  6.35927081223164E-01)
-X( 4) = ( -1.43337340627695E-02,  1.11787234433326E-01)
-
-X( 5) = (  3.10563986022220E-01,  3.33746049803795E-01)
-
-PATH NUMBER =      5344
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.75385265921109E-01, -1.39857640325828E-01)
-X( 2) = ( -7.66111256690548E-01, -1.36521331241389E-01)
-X( 3) = ( -3.44815359382210E-01,  7.66340413336649E-01)
-X( 4) = ( -2.22168638090889E-02,  2.39430311646067E-02)
-
-X( 5) = (  3.91081348571516E-01,  2.70882042839521E-01)
-
-PATH NUMBER =      5345
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.70641899588394E-02, -3.96212361235053E-01)
-X( 2) = ( -4.05851655359667E-01, -3.20195013073590E-01)
-X( 3) = ( -6.70166060243485E-01,  6.63581274607738E-01)
-X( 4) = (  2.82094738982758E-02, -4.84167107360951E-02)
-
-X( 5) = (  5.07273742979699E-01,  2.26276040923808E-01)
-
-PATH NUMBER =      5346
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.64591553364426E-01, -4.56031592730604E-01)
-X( 2) = ( -1.18136227726417E-02, -2.29326808382249E-01)
-X( 3) = ( -8.53346855546125E-01,  3.75731808088304E-01)
-X( 4) = (  1.13350235219730E-01, -7.14340638444879E-02)
-
-X( 5) = (  7.00390757366688E-01,  2.36129804711946E-01)
-
-PATH NUMBER =      5347
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.57168890455241E-01, -1.40988927114882E-01)
-X( 2) = (  1.41506116122169E-01,  2.32920858489593E-01)
-X( 3) = ( -8.92687204638874E-01, -6.79694360989771E-01)
-X( 4) = ( -1.00792280855935E-01,  1.49670958526630E-01)
-
-X( 5) = (  1.27716510085705E+00, -5.96775808990435E-01)
-
-PATH NUMBER =      5348
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.72953863202726E-01,  1.71175059151947E-01)
-X( 2) = (  1.20442389930035E-01,  6.36751666115490E-01)
-X( 3) = ( -6.41019829597990E-01, -9.10076763710250E-01)
-X( 4) = ( -6.33400750123239E-02,  2.29521318951371E-01)
-
-X( 5) = (  3.53055876057982E+00,  5.02284646991919E-02)
-
-PATH NUMBER =      5349
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.60995155609942E-01,  4.84731692043498E-01)
-X( 2) = ( -1.55270800022463E-01,  9.32564510047424E-01)
-X( 3) = ( -3.00144481475042E-01, -9.24791252668057E-01)
-X( 4) = ( -8.59768431533063E-02,  3.14764057707495E-01)
-
-X( 5) = (  7.80540725872330E-01,  1.79661575025604E+00)
-
-PATH NUMBER =      5350
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.73679491241988E-01,  6.52964338236008E-01)
-X( 2) = ( -5.56624187945768E-01,  9.81945273016086E-01)
-X( 3) = ( -2.95605240642630E-02, -7.16952754946504E-01)
-X( 4) = ( -1.58110589886061E-01,  3.65513149963495E-01)
-
-X( 5) = (  4.59060736150478E-01,  9.11552783168587E-01)
-
-PATH NUMBER =      5351
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.45445062614555E-01,  5.97155072878404E-01)
-X( 2) = ( -8.95820063084514E-01,  7.61788147222390E-01)
-X( 3) = (  4.41228017561279E-02, -3.83811213497113E-01)
-X( 4) = ( -2.45989133437036E-01,  3.58022531439456E-01)
-
-X( 5) = (  4.77545747940033E-01,  5.58716836997712E-01)
-
-PATH NUMBER =      5352
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.98764068017526E-02,  3.43417671482405E-01)
-X( 2) = ( -1.01414490571904E+00,  3.75107098599115E-01)
-X( 3) = ( -1.13571751064180E-01, -8.12472580198722E-02)
-X( 4) = ( -3.08493126617509E-01,  2.95797145791725E-01)
-
-X( 5) = (  5.26770514767090E-01,  3.46137805984664E-01)
-
-PATH NUMBER =      5353
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.78404936371361E-02,  1.04786841382983E-02)
-X( 2) = ( -8.56233206946508E-01,  2.83448727825172E-03)
-X( 3) = ( -4.28857148680829E-01,  4.91660740936124E-02)
-X( 4) = ( -3.16376256363828E-01,  2.07952942523006E-01)
-
-X( 5) = (  5.89400835742600E-01,  1.74714165203648E-01)
-
-PATH NUMBER =      5354
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.40289949517085E-01, -2.45876036770927E-01)
-X( 2) = ( -4.95973605615628E-01, -1.80839194553949E-01)
-X( 3) = ( -7.54207849542103E-01, -5.35930646352989E-02)
-X( 4) = ( -2.65949918656464E-01,  1.35593200622304E-01)
-
-X( 5) = (  6.77604469819560E-01, -5.40132264336333E-04)
-
-PATH NUMBER =      5355
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.67817312922670E-01, -3.05695268266478E-01)
-X( 2) = ( -1.01935573028602E-01, -8.99709898626077E-02)
-X( 3) = ( -9.37388644844743E-01, -3.41442531154733E-01)
-X( 4) = ( -1.80809157335009E-01,  1.12575847513911E-01)
-
-X( 5) = (  8.36296668098476E-01, -2.27048968498708E-01)
-
-PATH NUMBER =      5356
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.77007516843304E-01,  1.56267560281016E-01)
-X( 2) = (  2.74334431638085E-01,  2.16346924561647E-01)
-X( 3) = ( -6.85221520416449E-01, -7.89714861727323E-01)
-X( 4) = ( -3.14371605746215E-01, -1.26131517995101E-01)
-
-X( 5) = (  2.83098251404988E+00,  3.64312642433017E+00)
-
-PATH NUMBER =      5357
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.92792489590789E-01,  4.68431546547845E-01)
-X( 2) = (  2.53270705445951E-01,  6.20177732187544E-01)
-X( 3) = ( -4.33554145375565E-01, -1.02009726444780E+00)
-X( 4) = ( -2.76919399902605E-01, -4.62811575703596E-02)
-
-X( 5) = ( -8.16565815933704E-01,  1.71421370572931E+00)
-
-PATH NUMBER =      5358
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.80833781998005E-01,  7.81988179439396E-01)
-X( 2) = ( -2.24424845065478E-02,  9.15990576119478E-01)
-X( 3) = ( -9.26787972526172E-02, -1.03481175340561E+00)
-X( 4) = ( -2.99556168043587E-01,  3.89615811857640E-02)
-
-X( 5) = ( -3.13538423552369E-01,  9.62020193686029E-01)
-
-PATH NUMBER =      5359
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.93518117630052E-01,  9.50220825631906E-01)
-X( 2) = ( -4.23795872429852E-01,  9.65371339088140E-01)
-X( 3) = (  1.77905160158162E-01, -8.26973255684056E-01)
-X( 4) = ( -3.71689914776342E-01,  8.97106734417649E-02)
-
-X( 5) = ( -3.79419395754876E-02,  7.40704730852782E-01)
-
-PATH NUMBER =      5360
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.65283689002618E-01,  8.94411560274302E-01)
-X( 2) = ( -7.62991747568598E-01,  7.45214213294444E-01)
-X( 3) = (  2.51588485978553E-01, -4.93831714234665E-01)
-X( 4) = ( -4.59568458327317E-01,  8.22200549177248E-02)
-
-X( 5) = (  1.55498550034833E-01,  6.25489648116556E-01)
-
-PATH NUMBER =      5361
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.97150331898157E-02,  6.40674158878303E-01)
-X( 2) = ( -8.81316590203125E-01,  3.58533164671169E-01)
-X( 3) = (  9.38939331582450E-02, -1.91267758757424E-01)
-X( 4) = ( -5.22072451507789E-01,  1.99946692699941E-02)
-
-X( 5) = (  3.30588164516669E-01,  5.43821024962625E-01)
-
-PATH NUMBER =      5362
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.76791200251992E-02,  3.07735171534196E-01)
-X( 2) = ( -7.23404891430593E-01, -1.37394466496944E-02)
-X( 3) = ( -2.21391464458404E-01, -6.08544266439396E-02)
-X( 4) = ( -5.29955581254109E-01, -6.78495339987250E-02)
-
-X( 5) = (  5.31815967326524E-01,  4.72968981941470E-01)
-
-PATH NUMBER =      5363
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.60128575905147E-01,  5.13804506249706E-02)
-X( 2) = ( -3.63145290099712E-01, -1.97413128481895E-01)
-X( 3) = ( -5.46742165319679E-01, -1.63613565372851E-01)
-X( 4) = ( -4.79529243546744E-01, -1.40209275899427E-01)
-
-X( 5) = (  8.36807555880043E-01,  4.07323854529945E-01)
-
-PATH NUMBER =      5364
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.87655939310733E-01, -8.43878087058053E-03)
-X( 2) = (  3.08927424873136E-02, -1.06544923790554E-01)
-X( 3) = ( -7.29922960622319E-01, -4.51463031892284E-01)
-X( 4) = ( -3.94388482225290E-01, -1.63226629007820E-01)
-
-X( 5) = (  1.53533232176297E+00,  4.29822851786449E-01)
-
-PATH NUMBER =      5365
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.01131999349967E-01,  3.96731263867158E-01)
-X( 2) = (  3.86740344000554E-01,  2.89030950004688E-01)
-X( 3) = ( -4.55573771194376E-01, -7.40639083693177E-01)
-X( 4) = ( -3.00700446114486E-01, -4.74694616257714E-01)
-
-X( 5) = (  6.14902300938349E-02,  1.15966401250437E+00)
-
-PATH NUMBER =      5366
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.16916972097452E-01,  7.08895250133987E-01)
-X( 2) = (  3.65676617808420E-01,  6.92861757630585E-01)
-X( 3) = ( -2.03906396153493E-01, -9.71021486413657E-01)
-X( 4) = ( -2.63248240270876E-01, -3.94844255832972E-01)
-
-X( 5) = ( -2.15885871491877E-01,  8.00734966959827E-01)
-
-PATH NUMBER =      5367
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.04958264504668E-01,  1.02245188302554E+00)
-X( 2) = (  8.99634278559209E-02,  9.88674601562519E-01)
-X( 3) = (  1.36968951969455E-01, -9.85735975371463E-01)
-X( 4) = ( -2.85885008411858E-01, -3.09601517076849E-01)
-
-X( 5) = ( -1.40252491230432E-01,  5.80186974237046E-01)
-
-PATH NUMBER =      5368
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.17642600136715E-01,  1.19068452921805E+00)
-X( 2) = ( -3.11389960067383E-01,  1.03805536453118E+00)
-X( 3) = (  4.07552909380234E-01, -7.77897477649910E-01)
-X( 4) = ( -3.58018755144613E-01, -2.58852424820848E-01)
-
-X( 5) = ( -3.75274988181114E-02,  4.88447492066253E-01)
-
-PATH NUMBER =      5369
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.94081715092812E-02,  1.13487526386044E+00)
-X( 2) = ( -6.50585835206129E-01,  8.17898238737485E-01)
-X( 3) = (  4.81236235200625E-01, -4.44755936200519E-01)
-X( 4) = ( -4.45897298695588E-01, -2.66343043344888E-01)
-
-X( 5) = (  5.85804349579973E-02,  4.48036294035978E-01)
-
-PATH NUMBER =      5370
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.26160484303521E-01,  8.81137862464444E-01)
-X( 2) = ( -7.68910677840656E-01,  4.31217190114209E-01)
-X( 3) = (  3.23541682380317E-01, -1.42191980723278E-01)
-X( 4) = ( -5.08401291876060E-01, -3.28568428992619E-01)
-
-X( 5) = (  1.56469114283513E-01,  4.36129064693304E-01)
-
-PATH NUMBER =      5371
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.28196397468138E-01,  5.48198875120338E-01)
-X( 2) = ( -6.10998979068124E-01,  5.89445787933463E-02)
-X( 3) = (  8.25628476366867E-03, -1.17786486097937E-02)
-X( 4) = ( -5.16284421622380E-01, -4.16412632261338E-01)
-
-X( 5) = (  2.70450619682620E-01,  4.55890365865687E-01)
-
-PATH NUMBER =      5372
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.42530584118106E-02,  2.91844154211112E-01)
-X( 2) = ( -2.50739377737243E-01, -1.24729103038855E-01)
-X( 3) = ( -3.17094416097606E-01, -1.14537787338705E-01)
-X( 4) = ( -4.65858083915015E-01, -4.88772374162039E-01)
-
-X( 5) = (  4.15376085088165E-01,  5.47878483244661E-01)
-
-PATH NUMBER =      5373
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.11780421817396E-01,  2.32024922715561E-01)
-X( 2) = (  1.43298654849783E-01, -3.38608983475132E-02)
-X( 3) = ( -5.00275211400246E-01, -4.02387253858139E-01)
-X( 4) = ( -3.80717322593561E-01, -5.11789727270432E-01)
-
-X( 5) = (  5.15166573431089E-01,  8.55480036014627E-01)
-
-PATH NUMBER =      5374
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.11836447249013E-01,  4.67886544279205E-01)
-X( 2) = (  4.26127877562614E-01,  4.16963271520954E-01)
-X( 3) = ( -3.11198691084103E-01, -5.55430128846029E-01)
-X( 4) = ( -6.61756894904481E-02, -7.32921788736800E-01)
-
-X( 5) = (  1.86297469162535E-01,  6.38291895648769E-01)
-
-PATH NUMBER =      5375
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.27621419996498E-01,  7.80050530546034E-01)
-X( 2) = (  4.05064151370480E-01,  8.20794079146851E-01)
-X( 3) = ( -5.95313160432193E-02, -7.85812531566509E-01)
-X( 4) = ( -2.87234836468376E-02, -6.53071428312059E-01)
-
-X( 5) = (  2.02287078049473E-02,  5.71359195173255E-01)
-
-PATH NUMBER =      5376
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.15662712403714E-01,  1.09360716343758E+00)
-X( 2) = (  1.29350961417981E-01,  1.11660692307878E+00)
-X( 3) = (  2.81344032079729E-01, -8.00527020524316E-01)
-X( 4) = ( -5.13602517878197E-02, -5.67828689555935E-01)
-
-X( 5) = ( -3.65229248951873E-03,  4.52005445199162E-01)
-
-PATH NUMBER =      5377
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.28347048035761E-01,  1.26183980963009E+00)
-X( 2) = ( -2.72002426505322E-01,  1.16598768604745E+00)
-X( 3) = (  5.51927989490507E-01, -5.92688522802763E-01)
-X( 4) = ( -1.23493998520575E-01, -5.17079597299935E-01)
-
-X( 5) = (  3.17618786649120E-02,  3.79152092996085E-01)
-
-PATH NUMBER =      5378
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.99887380591673E-01,  1.20603054427249E+00)
-X( 2) = ( -6.11198301644069E-01,  9.45830560253750E-01)
-X( 3) = (  6.25611315310898E-01, -2.59546981353371E-01)
-X( 4) = ( -2.11372542071550E-01, -5.24570215823974E-01)
-
-X( 5) = (  8.12347556912924E-02,  3.40562757033363E-01)
-
-PATH NUMBER =      5379
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.15456036404475E-01,  9.52293142876492E-01)
-X( 2) = ( -7.29523144278596E-01,  5.59149511630475E-01)
-X( 3) = (  4.67916762490591E-01,  4.30169741238690E-02)
-X( 4) = ( -2.73876535252022E-01, -5.86795601471705E-01)
-
-X( 5) = (  1.37053945994952E-01,  3.24489707770535E-01)
-
-PATH NUMBER =      5380
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.17491949569092E-01,  6.19354155532385E-01)
-X( 2) = ( -5.71611445506063E-01,  1.86876900309612E-01)
-X( 3) = (  1.52631364873942E-01,  1.73430306237354E-01)
-X( 4) = ( -2.81759664998341E-01, -6.74639804740424E-01)
-
-X( 5) = (  2.00982216086167E-01,  3.31335421929209E-01)
-
-PATH NUMBER =      5381
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.05042493689143E-01,  3.62999434623159E-01)
-X( 2) = ( -2.11351844175183E-01,  3.20321847741118E-03)
-X( 3) = ( -1.72719335987333E-01,  7.06711675084424E-02)
-X( 4) = ( -2.31333327290977E-01, -7.46999546641126E-01)
-
-X( 5) = (  2.72055584474883E-01,  3.77956631252621E-01)
-
-PATH NUMBER =      5382
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.22484869716442E-01,  3.03180203127608E-01)
-X( 2) = (  1.82686188411843E-01,  9.40714231687527E-02)
-X( 3) = ( -3.55900131289973E-01, -2.17178299010991E-01)
-X( 4) = ( -1.46192565969523E-01, -7.70016899749519E-01)
-
-X( 5) = (  3.10426340079146E-01,  5.01502329262153E-01)
-
-PATH NUMBER =      5383
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.44485464530405E-01,  3.36439055009507E-01)
-X( 2) = (  3.74067167626902E-01,  5.40282934063605E-01)
-X( 3) = ( -3.19650984619511E-01, -3.20749325527113E-01)
-X( 4) = (  2.79465924049172E-01, -7.79985671554048E-01)
-
-X( 5) = (  2.78321667257944E-01,  4.23292100459797E-01)
-
-PATH NUMBER =      5384
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.60270437277890E-01,  6.48603041276336E-01)
-X( 2) = (  3.53003441434769E-01,  9.44113741689502E-01)
-X( 3) = ( -6.79836095786271E-02, -5.51131728247593E-01)
-X( 4) = (  3.16918129892783E-01, -7.00135311129306E-01)
-
-X( 5) = (  1.66953897938514E-01,  4.49895833842703E-01)
-
-PATH NUMBER =      5385
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.48311729685107E-01,  9.62159674167887E-01)
-X( 2) = (  7.72902514822700E-02,  1.23992658562144E+00)
-X( 3) = (  2.72891738544321E-01, -5.65846217205400E-01)
-X( 4) = (  2.94281361751800E-01, -6.14892572373183E-01)
-
-X( 5) = (  1.03032192699267E-01,  3.86088679585726E-01)
-
-PATH NUMBER =      5386
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.39003934682847E-01,  1.13039232036040E+00)
-X( 2) = ( -3.24063136441034E-01,  1.28930734859010E+00)
-X( 3) = (  5.43475695955100E-01, -3.58007719483847E-01)
-X( 4) = (  2.22147615019045E-01, -5.64143480117182E-01)
-
-X( 5) = (  1.00766304246087E-01,  3.22531300993067E-01)
-
-PATH NUMBER =      5387
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.67238363310280E-01,  1.07458305500279E+00)
-X( 2) = ( -6.63259011579780E-01,  1.06915022279640E+00)
-X( 3) = (  6.17159021775491E-01, -2.48661780344555E-02)
-X( 4) = (  1.34269071468070E-01, -5.71634098641222E-01)
-
-X( 5) = (  1.24355032719773E-01,  2.79876954189245E-01)
-
-PATH NUMBER =      5388
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.82807019123083E-01,  8.20845653606794E-01)
-X( 2) = ( -7.81583854214308E-01,  6.82469174173126E-01)
-X( 3) = (  4.59464468955183E-01,  2.77697777442785E-01)
-X( 4) = (  7.17650782875979E-02, -6.33859484288953E-01)
-
-X( 5) = (  1.59508218546187E-01,  2.54542654244847E-01)
-
-PATH NUMBER =      5389
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.84842932287700E-01,  4.87906666262687E-01)
-X( 2) = ( -6.23672155441776E-01,  3.10196562852263E-01)
-X( 3) = (  1.44179071338534E-01,  4.08111109556270E-01)
-X( 4) = (  6.38819485412790E-02, -7.21703687557672E-01)
-
-X( 5) = (  2.03742545350098E-01,  2.45536236966219E-01)
-
-PATH NUMBER =      5390
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.72393476407752E-01,  2.31551945353461E-01)
-X( 2) = ( -2.63412554110895E-01,  1.26522881020062E-01)
-X( 3) = ( -1.81171629522741E-01,  3.05351970827359E-01)
-X( 4) = (  1.14308286248644E-01, -7.94063429458374E-01)
-
-X( 5) = (  2.56576697187050E-01,  2.60708428524299E-01)
-
-PATH NUMBER =      5391
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.44866113002165E-01,  1.71732713857910E-01)
-X( 2) = (  1.30625478476131E-01,  2.17391085711404E-01)
-X( 3) = ( -3.64352424825381E-01,  1.75025043079251E-02)
-X( 4) = (  1.99449047570098E-01, -8.17080782566766E-01)
-
-X( 5) = (  3.03026310513663E-01,  3.20915749733380E-01)
-
-PATH NUMBER =      5392
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.41755472833840E-02,  6.38945371634715E-02)
-X( 2) = (  2.54917998962680E-01,  6.01287296983549E-01)
-X( 3) = ( -4.76975729718604E-01, -1.46406429795953E-01)
-X( 4) = (  5.74494842150542E-01, -5.93864550882472E-01)
-
-X( 5) = (  3.53361623046128E-01,  2.82882722536909E-01)
-
-PATH NUMBER =      5393
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.39960520030869E-01,  3.76058523430301E-01)
-X( 2) = (  2.33854272770546E-01,  1.00511810460945E+00)
-X( 3) = ( -2.25308354677720E-01, -3.76788832516433E-01)
-X( 4) = (  6.11947047994152E-01, -5.14014190457730E-01)
-
-X( 5) = (  2.90282081887466E-01,  3.58285688440457E-01)
-
-PATH NUMBER =      5394
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.80018124380855E-02,  6.89615156321852E-01)
-X( 2) = ( -4.18589171819523E-02,  1.30093094854138E+00)
-X( 3) = (  1.15566993445228E-01, -3.91503321474240E-01)
-X( 4) = (  5.89310279853170E-01, -4.28771451701607E-01)
-
-X( 5) = (  2.04966833804007E-01,  3.42700625533495E-01)
-
-PATH NUMBER =      5395
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.59313851929868E-01,  8.57847802514362E-01)
-X( 2) = ( -4.43212305105256E-01,  1.35031171151004E+00)
-X( 3) = (  3.86150950856007E-01, -1.83664823752687E-01)
-X( 4) = (  5.17176533120415E-01, -3.78022359445606E-01)
-
-X( 5) = (  1.72015986409056E-01,  2.88753148611601E-01)
-
-PATH NUMBER =      5396
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.87548280557302E-01,  8.02038537156758E-01)
-X( 2) = ( -7.82408180244003E-01,  1.13015458571635E+00)
-X( 3) = (  4.59834276676397E-01,  1.49476717696705E-01)
-X( 4) = (  4.29297989569440E-01, -3.85512977969646E-01)
-
-X( 5) = (  1.74948350656593E-01,  2.41620324647212E-01)
-
-PATH NUMBER =      5397
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.03116936370105E-01,  5.48301135760759E-01)
-X( 2) = ( -9.00733022878531E-01,  7.43473537093071E-01)
-X( 3) = (  3.02139723856090E-01,  4.52040673173946E-01)
-X( 4) = (  3.66793996388968E-01, -4.47738363617377E-01)
-
-X( 5) = (  1.95577921800548E-01,  2.07300241249921E-01)
-
-PATH NUMBER =      5398
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.05152849534721E-01,  2.15362148416652E-01)
-X( 2) = ( -7.42821324105998E-01,  3.71200925772208E-01)
-X( 3) = ( -1.31456737605587E-02,  5.82454005287430E-01)
-X( 4) = (  3.58910866642649E-01, -5.35582566886096E-01)
-
-X( 5) = (  2.28281210530475E-01,  1.85217581283955E-01)
-
-PATH NUMBER =      5399
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.92703393654772E-01, -4.09925724925741E-02)
-X( 2) = ( -3.82561722775117E-01,  1.87527243940007E-01)
-X( 3) = ( -3.38496374621834E-01,  4.79694866558519E-01)
-X( 4) = (  4.09337204350013E-01, -6.07942308786797E-01)
-
-X( 5) = (  2.73151506281495E-01,  1.79389074130013E-01)
-
-PATH NUMBER =      5400
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.65176030249187E-01, -1.00811803988125E-01)
-X( 2) = (  1.14763098119087E-02,  2.78395448631348E-01)
-X( 3) = ( -5.21677169924474E-01,  1.91845400039085E-01)
-X( 4) = (  4.94477965671467E-01, -6.30959661895190E-01)
-
-X( 5) = (  3.26661299516699E-01,  2.05105458204953E-01)
-
-PATH NUMBER =      5401
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07201042883622E-01, -2.22220400363823E-01)
-X( 2) = (  1.24431591783445E-01,  5.71431740882573E-01)
-X( 3) = ( -7.09558929679735E-01, -1.13978420170617E-01)
-X( 4) = (  6.80863755152838E-01, -2.61646567590149E-01)
-
-X( 5) = (  4.29614639089946E-01,  1.60571908779332E-01)
-
-PATH NUMBER =      5402
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.22986015631107E-01,  8.99435859030068E-02)
-X( 2) = (  1.03367865591311E-01,  9.75262548508470E-01)
-X( 3) = ( -4.57891554638851E-01, -3.44360822891097E-01)
-X( 4) = (  7.18315960996448E-01, -1.81796207165407E-01)
-
-X( 5) = (  4.23684865072465E-01,  2.68799633972127E-01)
-
-PATH NUMBER =      5403
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.11027308038324E-01,  4.03500218794557E-01)
-X( 2) = ( -1.72345324361187E-01,  1.27107539244040E+00)
-X( 3) = ( -1.17016206515903E-01, -3.59075311848903E-01)
-X( 4) = (  6.95679192855466E-01, -9.65534684092841E-02)
-
-X( 5) = (  3.26061480070275E-01,  3.11570836879182E-01)
-
-PATH NUMBER =      5404
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.76288356329630E-01,  5.71732864987068E-01)
-X( 2) = ( -5.73698712284491E-01,  1.32045615540907E+00)
-X( 3) = (  1.53567750894876E-01, -1.51236814127350E-01)
-X( 4) = (  6.23545446122711E-01, -4.58043761532833E-02)
-
-X( 5) = (  2.57550911233903E-01,  2.71313431475397E-01)
-
-PATH NUMBER =      5405
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.04522784957063E-01,  5.15923599629464E-01)
-X( 2) = ( -9.12894587423238E-01,  1.10029902961537E+00)
-X( 3) = (  2.27251076715266E-01,  1.81904727322041E-01)
-X( 4) = (  5.35666902571736E-01, -5.32949946773234E-02)
-
-X( 5) = (  2.37478687095303E-01,  2.18158294068903E-01)
-
-PATH NUMBER =      5406
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.20091440769866E-01,  2.62186198233464E-01)
-X( 2) = ( -1.03121943005776E+00,  7.13617980992094E-01)
-X( 3) = (  6.95565238949586E-02,  4.84468682799281E-01)
-X( 4) = (  4.73162909391264E-01, -1.15520380325054E-01)
-
-X( 5) = (  2.43954096906996E-01,  1.73181881683140E-01)
-
-PATH NUMBER =      5407
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.22127353934482E-01, -7.07527891106428E-02)
-X( 2) = ( -8.73307731285232E-01,  3.41345369671231E-01)
-X( 3) = ( -2.45728873721690E-01,  6.14882014912766E-01)
-X( 4) = (  4.65279779644944E-01, -2.03364583593773E-01)
-
-X( 5) = (  2.66941117182903E-01,  1.37647463490485E-01)
-
-PATH NUMBER =      5408
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.09677898054534E-01, -3.27107510019868E-01)
-X( 2) = ( -5.13048129954352E-01,  1.57671687839031E-01)
-X( 3) = ( -5.71079574582965E-01,  5.12122876183855E-01)
-X( 4) = (  5.15706117352309E-01, -2.75724325494475E-01)
-
-X( 5) = (  3.05992506110566E-01,  1.13061894546017E-01)
-
-PATH NUMBER =      5409
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.82150534648948E-01, -3.86926741515419E-01)
-X( 2) = ( -1.19010097367326E-01,  2.48539892530372E-01)
-X( 3) = ( -7.54260369885605E-01,  2.24273409664421E-01)
-X( 4) = (  6.00846878673763E-01, -2.98741678602868E-01)
-
-X( 5) = (  3.64438122034497E-01,  1.10387921369012E-01)
-
-PATH NUMBER =      5410
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.54713399214167E-01, -3.88029398490022E-01)
-X( 2) = (  4.36639862032414E-02,  4.64686012267868E-01)
-X( 3) = ( -9.08572320366752E-01, -2.38638722751981E-01)
-X( 4) = (  5.48801466503498E-01,  6.12197917488293E-02)
-
-X( 5) = (  5.28302650745394E-01,  2.41193907272558E-02)
-
-PATH NUMBER =      5411
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.70498371961652E-01, -7.58654122231930E-02)
-X( 2) = (  2.26002600111073E-02,  8.68516819893765E-01)
-X( 3) = ( -6.56904945325868E-01, -4.69021125472461E-01)
-X( 4) = (  5.86253672347108E-01,  1.41070152173571E-01)
-
-X( 5) = (  6.13809229911857E-01,  1.56744636347779E-01)
-
-PATH NUMBER =      5412
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.58539664368869E-01,  2.37691220668357E-01)
-X( 2) = ( -2.53112929941391E-01,  1.16432966382570E+00)
-X( 3) = ( -3.16029597202920E-01, -4.83735614430268E-01)
-X( 4) = (  5.63616904206126E-01,  2.26312890929695E-01)
-
-X( 5) = (  5.11860470865918E-01,  3.01804423322119E-01)
-
-PATH NUMBER =      5413
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.12240000009150E-02,  4.05923866860868E-01)
-X( 2) = ( -6.54466317864695E-01,  1.21371042679436E+00)
-X( 3) = ( -4.54456397921416E-02, -2.75897116708714E-01)
-X( 4) = (  4.91483157473371E-01,  2.77061983185695E-01)
-
-X( 5) = (  3.80157823378714E-01,  2.84309983911418E-01)
-
-PATH NUMBER =      5414
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.57010428626518E-01,  3.50114601503264E-01)
-X( 2) = ( -9.93662193003442E-01,  9.93553301000665E-01)
-X( 3) = (  2.82376860282493E-02,  5.72444247406767E-02)
-X( 4) = (  4.03604613922396E-01,  2.69571364661655E-01)
-
-X( 5) = (  3.24902404815273E-01,  2.16696294291536E-01)
-
-PATH NUMBER =      5415
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.72579084439321E-01,  9.63772001072646E-02)
-X( 2) = ( -1.11198703563797E+00,  6.06872252377390E-01)
-X( 3) = ( -1.29456866792058E-01,  3.59808380217917E-01)
-X( 4) = (  3.41100620741924E-01,  2.07345979013925E-01)
-
-X( 5) = (  3.13757731092049E-01,  1.53426242230843E-01)
-
-PATH NUMBER =      5416
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.74614997603937E-01, -2.36561787236842E-01)
-X( 2) = ( -9.54075336865436E-01,  2.34599641056526E-01)
-X( 3) = ( -4.44742264408707E-01,  4.90221712331402E-01)
-X( 4) = (  3.33217490995604E-01,  1.19501775745206E-01)
-
-X( 5) = (  3.26515154993798E-01,  9.87790600453365E-02)
-
-PATH NUMBER =      5417
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.62165541723989E-01, -4.92916508146068E-01)
-X( 2) = ( -5.93815735534556E-01,  5.09259592243257E-02)
-X( 3) = ( -7.70092965269982E-01,  3.87462573602491E-01)
-X( 4) = (  3.83643828702969E-01,  4.71420338445041E-02)
-
-X( 5) = (  3.60153706845352E-01,  5.09867369567424E-02)
-
-PATH NUMBER =      5418
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.53618216815969E-02, -5.52735739641619E-01)
-X( 2) = ( -1.99777702947530E-01,  1.41794163915667E-01)
-X( 3) = ( -9.53273760572622E-01,  9.96131070830570E-02)
-X( 4) = (  4.68784590024423E-01,  2.41246807361110E-02)
-
-X( 5) = (  4.23205974046466E-01,  1.50964375659847E-02)
-
-PATH NUMBER =      5419
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.50898833954525E-01, -3.55948584230129E-01)
-X( 2) = (  5.04072425049948E-02,  3.30997623904883E-01)
-X( 3) = ( -9.80895324489732E-01, -4.62057396517287E-01)
-X( 4) = (  2.40101388770399E-01,  2.23661769339866E-01)
-
-X( 5) = (  7.04453163564250E-01, -1.76005014998903E-01)
-
-PATH NUMBER =      5420
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.66683806702010E-01, -4.37845979632994E-02)
-X( 2) = (  2.93435163128609E-02,  7.34828431530780E-01)
-X( 3) = ( -7.29227949448848E-01, -6.92439799237766E-01)
-X( 4) = (  2.77553594614010E-01,  3.03512129764607E-01)
-
-X( 5) = (  1.02297163327887E+00, -3.09028505558295E-02)
-
-PATH NUMBER =      5421
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.54725099109227E-01,  2.69772034928251E-01)
-X( 2) = ( -2.46369673639638E-01,  1.03064127546271E+00)
-X( 3) = ( -3.88352601325900E-01, -7.07154288195573E-01)
-X( 4) = (  2.54916826473028E-01,  3.88754868520731E-01)
-
-X( 5) = (  9.02876188940730E-01,  4.37594662272916E-01)
-
-PATH NUMBER =      5422
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.67409434741273E-01,  4.38004681120761E-01)
-X( 2) = ( -6.47723061562942E-01,  1.08002203843138E+00)
-X( 3) = ( -1.17768643915121E-01, -4.99315790474020E-01)
-X( 4) = (  1.82783079740272E-01,  4.39503960776732E-01)
-
-X( 5) = (  5.68630867169980E-01,  4.21927560327647E-01)
-
-PATH NUMBER =      5423
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.91750061138399E-02,  3.82195415763158E-01)
-X( 2) = ( -9.86918936701688E-01,  8.59864912637680E-01)
-X( 3) = ( -4.40853180947301E-02, -1.66174249024629E-01)
-X( 4) = (  9.49045361892973E-02,  4.32013342252692E-01)
-
-X( 5) = (  4.52017878750544E-01,  2.86753222238048E-01)
-
-PATH NUMBER =      5424
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.76393649698963E-01,  1.28458014367158E-01)
-X( 2) = ( -1.10524377933622E+00,  4.73183864014404E-01)
-X( 3) = ( -2.01779870915038E-01,  1.36389706452612E-01)
-X( 4) = (  3.24005430088250E-02,  3.69787956604961E-01)
-
-X( 5) = (  4.22501588940752E-01,  1.75268257083179E-01)
-
-PATH NUMBER =      5425
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.78429562863579E-01, -2.04480972976949E-01)
-X( 2) = ( -9.47332080563683E-01,  1.00911252693541E-01)
-X( 3) = ( -5.17065268531687E-01,  2.66803038566096E-01)
-X( 4) = (  2.45174132625057E-02,  2.81943753336242E-01)
-
-X( 5) = (  4.28326817943655E-01,  8.15135423438713E-02)
-
-PATH NUMBER =      5426
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.40198930163692E-02, -4.60835693886174E-01)
-X( 2) = ( -5.87072479232802E-01, -8.27624291386600E-02)
-X( 3) = ( -8.42415969392961E-01,  1.64043899837185E-01)
-X( 4) = (  7.49437509698701E-02,  2.09584011435541E-01)
-
-X( 5) = (  4.60869722085762E-01, -7.37406506291516E-03)
-
-PATH NUMBER =      5427
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.61547256421955E-01, -5.20654925381725E-01)
-X( 2) = ( -1.93034446645777E-01,  8.10577555268158E-03)
-X( 3) = ( -1.02559676469560E+00, -1.23805566682249E-01)
-X( 4) = (  1.60084512291325E-01,  1.86566658327148E-01)
-
-X( 5) = (  5.34885255657050E-01, -9.94169719826224E-02)
-
-PATH NUMBER =      5428
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.96375901224049E-01, -1.92450108342928E-01)
-X( 2) = ( -1.49935812072521E-01,  2.98318269825490E-01)
-X( 3) = ( -7.03541855292726E-01, -1.17308229843391E+00)
-X( 4) = ( -2.30831415104164E-01,  3.77351192316173E-01)
-
-X( 5) = (  3.04949095163617E-01, -6.78444882297544E-01)
-
-PATH NUMBER =      5429
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01216087397153E+00,  1.19713877923901E-01)
-X( 2) = ( -1.70999538264655E-01,  7.02149077451386E-01)
-X( 3) = ( -4.51874480251842E-01, -1.40346470115439E+00)
-X( 4) = ( -1.93379209260553E-01,  4.57201552740914E-01)
-
-X( 5) = (  2.16191336586595E-01, -1.03977067032165E+00)
-
-PATH NUMBER =      5430
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.00202166378751E-01,  4.33270510815451E-01)
-X( 2) = ( -4.46712728217154E-01,  9.97961921383321E-01)
-X( 3) = ( -1.10999132128894E-01, -1.41817919011220E+00)
-X( 4) = ( -2.16015977401535E-01,  5.42444291497038E-01)
-
-X( 5) = (  5.04109904151586E-01, -2.06157572340729E+00)
-
-PATH NUMBER =      5431
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.12886502010797E-01,  6.01503157007961E-01)
-X( 2) = ( -8.48066116140458E-01,  1.04734268435198E+00)
-X( 3) = (  1.59584825281884E-01, -1.21034069239064E+00)
-X( 4) = ( -2.88149724134290E-01,  5.93193383753039E-01)
-
-X( 5) = (  2.80428555364842E+00, -4.08217902442628E-01)
-
-PATH NUMBER =      5432
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.84652073383363E-01,  5.45693891650358E-01)
-X( 2) = ( -1.18726199127920E+00,  8.27185558558286E-01)
-X( 3) = (  2.33268151102276E-01, -8.77199150941253E-01)
-X( 4) = ( -3.76028267685265E-01,  5.85702765228999E-01)
-
-X( 5) = (  1.23869918026348E+00,  1.69317996633583E-01)
-
-PATH NUMBER =      5433
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.90834175705610E-02,  2.91956490254358E-01)
-X( 2) = ( -1.30558683391373E+00,  4.40504509935011E-01)
-X( 3) = (  7.55735982819678E-02, -5.74635195464012E-01)
-X( 4) = ( -4.38532260865737E-01,  5.23477379581268E-01)
-
-X( 5) = (  8.08536282447643E-01, -3.58265717481118E-02)
-
-PATH NUMBER =      5434
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.70475044059447E-02, -4.09824970897486E-02)
-X( 2) = ( -1.14767513514120E+00,  6.82318986141479E-02)
-X( 3) = ( -2.39711799334681E-01, -4.44221863350527E-01)
-X( 4) = ( -4.46415390612057E-01,  4.35633176312549E-01)
-
-X( 5) = (  6.19384927002228E-01, -1.95598701846389E-01)
-
-PATH NUMBER =      5435
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.79496960285893E-01, -2.97337217998974E-01)
-X( 2) = ( -7.87415533810318E-01, -1.15441783218053E-01)
-X( 3) = ( -5.65062500195956E-01, -5.46981002079438E-01)
-X( 4) = ( -3.95989052904692E-01,  3.63273434411847E-01)
-
-X( 5) = (  4.98704777252408E-01, -3.33998862034746E-01)
-
-PATH NUMBER =      5436
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.07024323691479E-01, -3.57156449494525E-01)
-X( 2) = ( -3.93377501223292E-01, -2.45735785267116E-02)
-X( 3) = ( -7.48243295498596E-01, -8.34830468598873E-01)
-X( 4) = ( -3.10848291583238E-01,  3.40256081303454E-01)
-
-X( 5) = (  4.00301877048146E-01, -4.81021744168254E-01)
-
-PATH NUMBER =      5437
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.16214527612112E-01,  1.04806379052969E-01)
-X( 2) = ( -1.71074965566054E-02,  2.81744335897544E-01)
-X( 3) = ( -4.96076171070302E-01, -1.28310279917146E+00)
-X( 4) = ( -4.44410739994444E-01,  1.01548715794442E-01)
-
-X( 5) = (  7.26106049630768E-02, -1.32089845179187E+00)
-
-PATH NUMBER =      5438
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03199950035960E+00,  4.16970365319798E-01)
-X( 2) = ( -3.81712227487394E-02,  6.85575143523441E-01)
-X( 3) = ( -2.44408796029418E-01, -1.51348520189194E+00)
-X( 4) = ( -4.06958534150833E-01,  1.81399076219184E-01)
-
-X( 5) = ( -1.04592736521821E+00, -1.48162246284959E+00)
-
-PATH NUMBER =      5439
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.20040792766813E-01,  7.30526998211348E-01)
-X( 2) = ( -3.13884412701238E-01,  9.81387987455374E-01)
-X( 3) = (  9.64665520935300E-02, -1.52819969084975E+00)
-X( 4) = ( -4.29595302291816E-01,  2.66641814975307E-01)
-
-X( 5) = ( -2.51111689533989E+00,  8.67563928223106E-02)
-
-PATH NUMBER =      5440
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.32725128398860E-01,  8.98759644403858E-01)
-X( 2) = ( -7.15237800624542E-01,  1.03076875042404E+00)
-X( 3) = (  3.67050509504309E-01, -1.32036119312820E+00)
-X( 4) = ( -5.01729049024571E-01,  3.17390907231308E-01)
-
-X( 5) = ( -7.91835226146772E-01,  2.07539754227459E+00)
-
-PATH NUMBER =      5441
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.04490699771426E-01,  8.42950379046255E-01)
-X( 2) = ( -1.05443367576329E+00,  8.10611624630340E-01)
-X( 3) = (  4.40733835324700E-01, -9.87219651678805E-01)
-X( 4) = ( -5.89607592575546E-01,  3.09900288707268E-01)
-
-X( 5) = (  6.79662388632863E-01,  1.39328454092025E+00)
-
-PATH NUMBER =      5442
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.89220439586242E-02,  5.89212977650256E-01)
-X( 2) = ( -1.17275851839782E+00,  4.23930576007065E-01)
-X( 3) = (  2.83039282504392E-01, -6.84655696201564E-01)
-X( 4) = ( -6.52111585756018E-01,  2.47674903059537E-01)
-
-X( 5) = (  1.03696129404734E+00,  5.96308690258133E-01)
-
-PATH NUMBER =      5443
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.68861307940075E-02,  2.56273990306149E-01)
-X( 2) = ( -1.01484681962528E+00,  5.16579646862017E-02)
-X( 3) = ( -3.22461151122560E-02, -5.54242364088079E-01)
-X( 4) = ( -6.59994715502337E-01,  1.59830699790818E-01)
-
-X( 5) = (  1.04331125458073E+00,  8.51576201331645E-03)
-
-PATH NUMBER =      5444
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.99335586673956E-01, -8.07306030765284E-05)
-X( 2) = ( -6.54587218294402E-01, -1.32015717145999E-01)
-X( 3) = ( -3.57596815973531E-01, -6.57001502816990E-01)
-X( 4) = ( -6.09568377794973E-01,  8.74709578901164E-02)
-
-X( 5) = (  8.99277750797213E-01, -4.68511169094193E-01)
-
-PATH NUMBER =      5445
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.26862950079541E-01, -5.98999620986276E-02)
-X( 2) = ( -2.60549185707377E-01, -4.11475124546575E-02)
-X( 3) = ( -5.40777611276171E-01, -9.44850969336424E-01)
-X( 4) = ( -5.24427616473518E-01,  6.44536047817237E-02)
-
-X( 5) = (  6.13431258059970E-01, -9.05910323325592E-01)
-
-PATH NUMBER =      5446
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.40339010118775E-01,  3.45270082639111E-01)
-X( 2) = (  9.52984158058636E-02,  3.54428361340584E-01)
-X( 3) = ( -2.66428421848229E-01, -1.23402702113732E+00)
-X( 4) = ( -4.30739580362715E-01, -2.47014382468171E-01)
-
-X( 5) = ( -7.09912428136395E+00, -1.02101633483612E+01)
-
-PATH NUMBER =      5447
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.56123982866260E-01,  6.57434068905940E-01)
-X( 2) = (  7.42346896137296E-02,  7.58259168966481E-01)
-X( 3) = ( -1.47610468073450E-02, -1.46440942385780E+00)
-X( 4) = ( -3.93287374519104E-01, -1.67164022043429E-01)
-
-X( 5) = ( -1.83328088762455E+00,  1.07766792736138E+00)
-
-PATH NUMBER =      5448
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.44165275273477E-01,  9.70990701797490E-01)
-X( 2) = ( -2.01478500338769E-01,  1.05407201289842E+00)
-X( 3) = (  3.26114301315602E-01, -1.47912391281560E+00)
-X( 4) = ( -4.15924142660086E-01, -8.19212832873057E-02)
-
-X( 5) = ( -6.65615696673313E-01,  9.63811161667024E-01)
-
-PATH NUMBER =      5449
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.56849610905523E-01,  1.13922334799000E+00)
-X( 2) = ( -6.02831888262073E-01,  1.10345277586708E+00)
-X( 3) = (  5.96698258726382E-01, -1.27128541509405E+00)
-X( 4) = ( -4.88057889392842E-01, -3.11721910313049E-02)
-
-X( 5) = ( -1.91832777571204E-01,  8.58554356591729E-01)
-
-PATH NUMBER =      5450
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.28615182278090E-01,  1.08341408263240E+00)
-X( 2) = ( -9.42027763400820E-01,  8.83295650073381E-01)
-X( 3) = (  6.70381584546773E-01, -9.38143873644659E-01)
-X( 4) = ( -5.75936432943817E-01, -3.86628095553447E-02)
-
-X( 5) = (  1.18628219878116E-01,  7.70043344242846E-01)
-
-PATH NUMBER =      5451
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.69534735347131E-02,  8.29676681236397E-01)
-X( 2) = ( -1.06035260603535E+00,  4.96614601450105E-01)
-X( 3) = (  5.12687031726465E-01, -6.35579918167418E-01)
-X( 4) = ( -6.38440426124289E-01, -1.00888195203076E-01)
-
-X( 5) = (  3.91396303829034E-01,  6.78931599067935E-01)
-
-PATH NUMBER =      5452
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.89893866993294E-02,  4.96737693892291E-01)
-X( 2) = ( -9.02440907262814E-01,  1.24341990129242E-01)
-X( 3) = (  1.97401634109816E-01, -5.05166586053933E-01)
-X( 4) = ( -6.46323555870608E-01, -1.88732398471795E-01)
-
-X( 5) = (  7.00232810018986E-01,  5.59991985762544E-01)
-
-PATH NUMBER =      5453
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.23460069180619E-01,  2.40382972983065E-01)
-X( 2) = ( -5.42181305931934E-01, -5.93316917029585E-02)
-X( 3) = ( -1.27949066751458E-01, -6.07925724782845E-01)
-X( 4) = ( -5.95897218163244E-01, -2.61092140372496E-01)
-
-X( 5) = (  1.16790398073203E+00,  3.45819649130522E-01)
-
-PATH NUMBER =      5454
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.50987432586205E-01,  1.80563741487514E-01)
-X( 2) = ( -1.48143273344908E-01,  3.15365129883831E-02)
-X( 3) = ( -3.11129862054099E-01, -8.95775191302279E-01)
-X( 4) = ( -5.10756456841789E-01, -2.84109493480889E-01)
-
-X( 5) = (  2.29361764408131E+00, -3.67327386483678E-01)
-
-PATH NUMBER =      5455
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.51043458017821E-01,  4.16425363051158E-01)
-X( 2) = (  1.34685949367924E-01,  4.82360682856850E-01)
-X( 3) = ( -1.22053341737955E-01, -1.04881806629017E+00)
-X( 4) = ( -1.96214823738677E-01, -5.05241554947257E-01)
-
-X( 5) = (  8.75211642570213E-01,  1.37376076412300E+00)
-
-PATH NUMBER =      5456
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.66828430765306E-01,  7.28589349317987E-01)
-X( 2) = (  1.13622223175790E-01,  8.86191490482747E-01)
-X( 3) = (  1.29614033302928E-01, -1.27920046901065E+00)
-X( 4) = ( -1.58762617895067E-01, -4.25391194522516E-01)
-
-X( 5) = ( -4.37604543262630E-02,  1.21482501540528E+00)
-
-PATH NUMBER =      5457
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.54869723172523E-01,  1.04214598220954E+00)
-X( 2) = ( -1.62090966776709E-01,  1.18200433441468E+00)
-X( 3) = (  4.70489381425876E-01, -1.29391495796846E+00)
-X( 4) = ( -1.81399386036049E-01, -3.40148455766392E-01)
-
-X( 5) = ( -6.56319398786522E-02,  7.71846408373606E-01)
-
-PATH NUMBER =      5458
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.67554058804569E-01,  1.21037862840205E+00)
-X( 2) = ( -5.63444354700013E-01,  1.23138509738334E+00)
-X( 3) = (  7.41073338836655E-01, -1.08607646024690E+00)
-X( 4) = ( -2.53533132768804E-01, -2.89399363510391E-01)
-
-X( 5) = (  4.43616672598498E-02,  5.87260501566925E-01)
-
-PATH NUMBER =      5459
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.60680369822864E-01,  1.15456936304444E+00)
-X( 2) = ( -9.02640229838760E-01,  1.01122797158965E+00)
-X( 3) = (  8.14756664657046E-01, -7.52934918797511E-01)
-X( 4) = ( -3.41411676319779E-01, -2.96889982034431E-01)
-
-X( 5) = (  1.52020903177718E-01,  4.92985644629644E-01)
-
-PATH NUMBER =      5460
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.76249025635667E-01,  9.00831961648445E-01)
-X( 2) = ( -1.02096507247329E+00,  6.24546922966371E-01)
-X( 3) = (  6.57062111836739E-01, -4.50370963320271E-01)
-X( 4) = ( -4.03915669500251E-01, -3.59115367682162E-01)
-
-X( 5) = (  2.61099810605231E-01,  4.35378908048496E-01)
-
-PATH NUMBER =      5461
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.78284938800283E-01,  5.67892974304338E-01)
-X( 2) = ( -8.63053373700754E-01,  2.52274311645508E-01)
-X( 3) = (  3.41776714220090E-01, -3.19957631206786E-01)
-X( 4) = ( -4.11798799246571E-01, -4.46959570950881E-01)
-
-X( 5) = (  3.90372801800923E-01,  4.00884885715370E-01)
-
-PATH NUMBER =      5462
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.65835482920335E-01,  3.11538253395112E-01)
-X( 2) = ( -5.02793772369873E-01,  6.86006298133072E-02)
-X( 3) = (  1.64260133588150E-02, -4.22716769935697E-01)
-X( 4) = ( -3.61372461539206E-01, -5.19319312851583E-01)
-
-X( 5) = (  5.75778284167106E-01,  4.04430948607249E-01)
-
-PATH NUMBER =      5463
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.61691880485251E-01,  2.51719021899561E-01)
-X( 2) = ( -1.08755739782848E-01,  1.59468834504649E-01)
-X( 3) = ( -1.66754781943825E-01, -7.10566236455131E-01)
-X( 4) = ( -2.76231700217752E-01, -5.42336665959976E-01)
-
-X( 5) = (  8.82643836313376E-01,  5.68378852275145E-01)
-
-PATH NUMBER =      5464
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.83692475299213E-01,  2.84977873781460E-01)
-X( 2) = (  8.26252394322119E-02,  6.05680345399501E-01)
-X( 3) = ( -1.30505635273363E-01, -8.14137262971253E-01)
-X( 4) = (  1.49426789800943E-01, -5.52305437764505E-01)
-
-X( 5) = (  6.57872496302110E-01,  4.79295233602323E-01)
-
-PATH NUMBER =      5465
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.99477448046699E-01,  5.97141860048289E-01)
-X( 2) = (  6.15615132400780E-02,  1.00951115302540E+00)
-X( 3) = (  1.21161739767520E-01, -1.04451966569173E+00)
-X( 4) = (  1.86878995644554E-01, -4.72455077339763E-01)
-
-X( 5) = (  4.34611127406936E-01,  7.05094074462939E-01)
-
-PATH NUMBER =      5466
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87518740453915E-01,  9.10698492939839E-01)
-X( 2) = ( -2.14151676712421E-01,  1.30532399695733E+00)
-X( 3) = (  4.62037087890468E-01, -1.05923415464954E+00)
-X( 4) = (  1.64242227503572E-01, -3.87212338583639E-01)
-
-X( 5) = (  2.18646091033499E-01,  5.89107273981328E-01)
-
-PATH NUMBER =      5467
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.97969239140388E-02,  1.07893113913235E+00)
-X( 2) = ( -6.15505064635725E-01,  1.35470475992599E+00)
-X( 3) = (  7.32621045301247E-01, -8.51395656927986E-01)
-X( 4) = (  9.21084807708168E-02, -3.36463246327639E-01)
-
-X( 5) = (  1.86945894337646E-01,  4.48761770699007E-01)
-
-PATH NUMBER =      5468
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.28031352541472E-01,  1.02312187377475E+00)
-X( 2) = ( -9.54700939774471E-01,  1.13454763413230E+00)
-X( 3) = (  8.06304371121638E-01, -5.18254115478595E-01)
-X( 4) = (  4.22993721984131E-03, -3.43953864851679E-01)
-
-X( 5) = (  2.14333310899573E-01,  3.57361492172699E-01)
-
-PATH NUMBER =      5469
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.43600008354275E-01,  7.69384472378747E-01)
-X( 2) = ( -1.07302578240900E+00,  7.47866585509022E-01)
-X( 3) = (  6.48609818301331E-01, -2.15690160001354E-01)
-X( 4) = ( -5.82740559606307E-02, -4.06179250499410E-01)
-
-X( 5) = (  2.61883895753030E-01,  2.96063376274960E-01)
-
-PATH NUMBER =      5470
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.45635921518891E-01,  4.36445485034640E-01)
-X( 2) = ( -9.15114083636466E-01,  3.75593974188159E-01)
-X( 3) = (  3.33324420684682E-01, -8.52768278878695E-02)
-X( 4) = ( -6.61571857069502E-02, -4.94023453768129E-01)
-
-X( 5) = (  3.26140734758451E-01,  2.53759622952746E-01)
-
-PATH NUMBER =      5471
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.33186465638943E-01,  1.80090764125414E-01)
-X( 2) = ( -5.54854482305585E-01,  1.91920292355958E-01)
-X( 3) = (  7.97371982340715E-03, -1.88035966616781E-01)
-X( 4) = ( -1.57308479995855E-02, -5.66383195668830E-01)
-
-X( 5) = (  4.16891072616373E-01,  2.33446041487020E-01)
-
-PATH NUMBER =      5472
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.05659102233357E-01,  1.20271532629863E-01)
-X( 2) = ( -1.60816449718559E-01,  2.82788497047300E-01)
-X( 3) = ( -1.75207075479233E-01, -4.75885433136215E-01)
-X( 4) = (  6.94099133218690E-02, -5.89400548777223E-01)
-
-X( 5) = (  5.49616984415435E-01,  2.70827718064422E-01)
-
-PATH NUMBER =      5473
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.33825580521926E-02,  1.24333559354248E-02)
-X( 2) = ( -3.65239292320101E-02,  6.66684708319445E-01)
-X( 3) = ( -2.87830380372456E-01, -6.39794367240093E-01)
-X( 4) = (  4.44455707902313E-01, -3.66184317092929E-01)
-
-X( 5) = (  5.68250001438129E-01,  1.58228353382087E-01)
-
-PATH NUMBER =      5474
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.79167530799678E-01,  3.24597342202254E-01)
-X( 2) = ( -5.75876554241439E-02,  1.07051551594534E+00)
-X( 3) = ( -3.61630053315723E-02, -8.70176769960573E-01)
-X( 4) = (  4.81907913745923E-01, -2.86333956668187E-01)
-
-X( 5) = (  5.79351074748903E-01,  3.45276155788914E-01)
-
-PATH NUMBER =      5475
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.72088232068941E-02,  6.38153975093805E-01)
-X( 2) = ( -3.33300845376643E-01,  1.36632835987728E+00)
-X( 3) = (  3.04712342791376E-01, -8.84891258918380E-01)
-X( 4) = (  4.59271145604941E-01, -2.01091217912064E-01)
-
-X( 5) = (  4.08618731309076E-01,  4.18665471483428E-01)
-
-PATH NUMBER =      5476
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.20106841161059E-01,  8.06386621286315E-01)
-X( 2) = ( -7.34654233299947E-01,  1.41570912284594E+00)
-X( 3) = (  5.75296300202155E-01, -6.77052761196827E-01)
-X( 4) = (  3.87137398872186E-01, -1.50342125656063E-01)
-
-X( 5) = (  3.04142382932939E-01,  3.46419620483379E-01)
-
-PATH NUMBER =      5477
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.48341269788493E-01,  7.50577355928711E-01)
-X( 2) = ( -1.07385010843869E+00,  1.19555199705224E+00)
-X( 3) = (  6.48979626022546E-01, -3.43911219747435E-01)
-X( 4) = (  2.99258855321211E-01, -1.57832744180103E-01)
-
-X( 5) = (  2.79137176894778E-01,  2.66450831380352E-01)
-
-PATH NUMBER =      5478
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.63909925601296E-01,  4.96839954532712E-01)
-X( 2) = ( -1.19217495107322E+00,  8.08870948428967E-01)
-X( 3) = (  4.91285073202238E-01, -4.13472642701947E-02)
-X( 4) = (  2.36754862140739E-01, -2.20058129827834E-01)
-
-X( 5) = (  2.89171952097386E-01,  2.03021016128082E-01)
-
-PATH NUMBER =      5479
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.65945838765912E-01,  1.63900967188605E-01)
-X( 2) = ( -1.03426325230069E+00,  4.36598337108103E-01)
-X( 3) = (  1.75999675585589E-01,  8.90660678432903E-02)
-X( 4) = (  2.28871732394419E-01, -3.07902333096553E-01)
-
-X( 5) = (  3.19363130939181E-01,  1.52456287688420E-01)
-
-PATH NUMBER =      5480
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.53496382885964E-01, -9.24537537206207E-02)
-X( 2) = ( -6.74003650969808E-01,  2.52924655275903E-01)
-X( 3) = ( -1.49351025275686E-01, -1.36930708856210E-02)
-X( 4) = (  2.79298070101784E-01, -3.80262074997254E-01)
-
-X( 5) = (  3.70820745804012E-01,  1.13349160439413E-01)
-
-PATH NUMBER =      5481
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.25969019480378E-01, -1.52272985216172E-01)
-X( 2) = ( -2.79965618382782E-01,  3.43792859967244E-01)
-X( 3) = ( -3.32531820578326E-01, -3.01542537405055E-01)
-X( 4) = (  3.64438831423239E-01, -4.03279428105647E-01)
-
-X( 5) = (  4.54224619171819E-01,  9.77235016133316E-02)
-
-PATH NUMBER =      5482
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.46408053652431E-01, -2.73681581591869E-01)
-X( 2) = ( -1.67010336411245E-01,  6.36829152218469E-01)
-X( 3) = ( -5.20413580333587E-01, -6.07366357614756E-01)
-X( 4) = (  5.50824620904609E-01, -3.39663338006063E-02)
-
-X( 5) = (  5.09059541736790E-01, -4.24227831374015E-02)
-
-PATH NUMBER =      5483
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.62193026399916E-01,  3.84824046749600E-02)
-X( 2) = ( -1.88074062603379E-01,  1.04065995984437E+00)
-X( 3) = ( -2.68746205292704E-01, -8.37748760335236E-01)
-X( 4) = (  5.88276826748220E-01,  4.58840266241353E-02)
-
-X( 5) = (  6.23440491730484E-01,  5.55317738050286E-02)
-
-PATH NUMBER =      5484
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.50234318807132E-01,  3.52039037566510E-01)
-X( 2) = ( -4.63787252555878E-01,  1.33647280377630E+00)
-X( 3) = (  7.21291428302442E-02, -8.52463249293043E-01)
-X( 4) = (  5.65640058607237E-01,  1.31126765380259E-01)
-
-X( 5) = (  5.69958776424072E-01,  2.28473837260545E-01)
-
-PATH NUMBER =      5485
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.37081345560821E-01,  5.20271683759021E-01)
-X( 2) = ( -8.65140640479182E-01,  1.38585356674496E+00)
-X( 3) = (  3.42713100241023E-01, -6.44624751571490E-01)
-X( 4) = (  4.93506311874482E-01,  1.81875857636260E-01)
-
-X( 5) = (  4.28187148103690E-01,  2.47970267948167E-01)
-
-PATH NUMBER =      5486
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.65315774188255E-01,  4.64462418401417E-01)
-X( 2) = ( -1.20433651561793E+00,  1.16569644095127E+00)
-X( 3) = (  4.16396426061414E-01, -3.11483210122099E-01)
-X( 4) = (  4.05627768323507E-01,  1.74385239112220E-01)
-
-X( 5) = (  3.54769022853737E-01,  1.89664027528046E-01)
-
-PATH NUMBER =      5487
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.80884430001057E-01,  2.10725017005417E-01)
-X( 2) = ( -1.32266135825245E+00,  7.79015392327990E-01)
-X( 3) = (  2.58701873241106E-01, -8.91925464485815E-03)
-X( 4) = (  3.43123775143034E-01,  1.12159853464489E-01)
-
-X( 5) = (  3.31066838380661E-01,  1.26810974810911E-01)
-
-PATH NUMBER =      5488
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.82920343165673E-01, -1.22213970338689E-01)
-X( 2) = ( -1.16474965947992E+00,  4.06742781007128E-01)
-X( 3) = ( -5.65835243755422E-02,  1.21494077468627E-01)
-X( 4) = (  3.35240645396715E-01,  2.43156501957699E-02)
-
-X( 5) = (  3.34075662499952E-01,  6.98985115357574E-02)
-
-PATH NUMBER =      5489
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.70470887285725E-01, -3.78568691247915E-01)
-X( 2) = ( -8.04490058149042E-01,  2.23069099174926E-01)
-X( 3) = ( -3.81934225236817E-01,  1.87349387397154E-02)
-X( 4) = (  3.85666983104080E-01, -4.80440917049315E-02)
-
-X( 5) = (  3.58336172691299E-01,  1.75750363412835E-02)
-
-PATH NUMBER =      5490
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.42943523880139E-01, -4.38387922743466E-01)
-X( 2) = ( -4.10452025562016E-01,  3.13937303866268E-01)
-X( 3) = ( -5.65115020539457E-01, -2.69114527779718E-01)
-X( 4) = (  4.70807744425534E-01, -7.10614448133246E-02)
-
-X( 5) = (  4.11007594630143E-01, -2.79392811727896E-02)
-
-PATH NUMBER =      5491
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.93920409982976E-01, -4.39490579718069E-01)
-X( 2) = ( -2.47777941991449E-01,  5.30083423603764E-01)
-X( 3) = ( -7.19426971020605E-01, -7.32026660196121E-01)
-X( 4) = (  4.18762332255269E-01,  2.88900025538372E-01)
-
-X( 5) = (  4.56686351524038E-01, -2.13347114820744E-01)
-
-PATH NUMBER =      5492
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.09705382730461E-01, -1.27326593451240E-01)
-X( 2) = ( -2.68841668183583E-01,  9.33914231229661E-01)
-X( 3) = ( -4.67759595979721E-01, -9.62409062916601E-01)
-X( 4) = (  4.56214538098880E-01,  3.68750385963114E-01)
-
-X( 5) = (  6.10777978730273E-01, -2.27400814153157E-01)
-
-PATH NUMBER =      5493
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.97746675137677E-01,  1.86230039440310E-01)
-X( 2) = ( -5.44554858136082E-01,  1.22972707516160E+00)
-X( 3) = ( -1.26884247856773E-01, -9.77123551874407E-01)
-X( 4) = (  4.33577769957897E-01,  4.53993124719238E-01)
-
-X( 5) = (  7.34268535977841E-01, -3.84739992221160E-02)
-
-PATH NUMBER =      5494
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.10431010769723E-01,  3.54462685632820E-01)
-X( 2) = ( -9.45908246059386E-01,  1.27910783813026E+00)
-X( 3) = (  1.43699709554006E-01, -7.69285054152854E-01)
-X( 4) = (  3.61444023225142E-01,  5.04742216975239E-01)
-
-X( 5) = (  6.00209790498107E-01,  1.26291180064159E-01)
-
-PATH NUMBER =      5495
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.17803417857710E-01,  2.98653420275217E-01)
-X( 2) = ( -1.28510412119813E+00,  1.05895071233656E+00)
-X( 3) = (  2.17383035374397E-01, -4.36143512703463E-01)
-X( 4) = (  2.73565479674167E-01,  4.97251598451199E-01)
-
-X( 5) = (  4.63207702193470E-01,  1.12433341237903E-01)
-
-PATH NUMBER =      5496
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.33372073670512E-01,  4.49160188792174E-02)
-X( 2) = ( -1.40342896383266E+00,  6.72269663713286E-01)
-X( 3) = (  5.96884825540893E-02, -1.33579557226223E-01)
-X( 4) = (  2.11061486493695E-01,  4.35026212803468E-01)
-
-X( 5) = (  3.96036317558288E-01,  5.29783763583175E-02)
-
-PATH NUMBER =      5497
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.35407986835128E-01, -2.88022968464889E-01)
-X( 2) = ( -1.24551726506013E+00,  2.99997052392423E-01)
-X( 3) = ( -2.55596915062559E-01, -3.16622511273772E-03)
-X( 4) = (  2.03178356747375E-01,  3.47182009534749E-01)
-
-X( 5) = (  3.68115721668568E-01, -1.04540353952022E-02)
-
-PATH NUMBER =      5498
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.22958530955181E-01, -5.44377689374115E-01)
-X( 2) = ( -8.85257663729246E-01,  1.16323370560222E-01)
-X( 3) = ( -5.80947615923834E-01, -1.05925363841649E-01)
-X( 4) = (  2.53604694454740E-01,  2.74822267634047E-01)
-
-X( 5) = (  3.64747728264095E-01, -7.49545473553391E-02)
-
-PATH NUMBER =      5499
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04568832450405E-01, -6.04196920869666E-01)
-X( 2) = ( -4.91219631142220E-01,  2.07191575251563E-01)
-X( 3) = ( -7.64128411226475E-01, -3.93774830361083E-01)
-X( 4) = (  3.38745455776194E-01,  2.51804914525654E-01)
-
-X( 5) = (  3.87483100329267E-01, -1.43783878581719E-01)
-
-PATH NUMBER =      5500
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.90105844723334E-01, -4.07409765458176E-01)
-X( 2) = ( -2.41034685689696E-01,  3.96395035240779E-01)
-X( 3) = ( -7.91749975143584E-01, -9.55445333961426E-01)
-X( 4) = (  1.10062254522170E-01,  4.51342003129409E-01)
-
-X( 5) = (  3.96874371518553E-01, -4.01695397492679E-01)
-
-PATH NUMBER =      5501
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.05890817470819E-01, -9.52457791913466E-02)
-X( 2) = ( -2.62098411881830E-01,  8.00225842866676E-01)
-X( 3) = ( -5.40082600102700E-01, -1.18582773668191E+00)
-X( 4) = (  1.47514460365781E-01,  5.31192363554151E-01)
-
-X( 5) = (  5.21802086877412E-01, -5.63230481564397E-01)
-
-PATH NUMBER =      5502
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.93932109878035E-01,  2.18310853700204E-01)
-X( 2) = ( -5.37811601834329E-01,  1.09603868679861E+00)
-X( 3) = ( -1.99207251979752E-01, -1.20054222563971E+00)
-X( 4) = (  1.24877692224798E-01,  6.16435102310274E-01)
-
-X( 5) = (  9.04973112803318E-01, -5.51970752768920E-01)
-
-PATH NUMBER =      5503
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.06616445510082E-01,  3.86543499892714E-01)
-X( 2) = ( -9.39164989757633E-01,  1.14541944976727E+00)
-X( 3) = (  7.13767054310262E-02, -9.92703727918160E-01)
-X( 4) = (  5.27439454920435E-02,  6.67184194566275E-01)
-
-X( 5) = (  9.52841424800795E-01, -7.70968642170552E-02)
-
-PATH NUMBER =      5504
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.83820168826482E-02,  3.30734234535111E-01)
-X( 2) = ( -1.27836086489638E+00,  9.25262323973575E-01)
-X( 3) = (  1.45060031251417E-01, -6.59562186468769E-01)
-X( 4) = ( -3.51345980589320E-02,  6.59693576042235E-01)
-
-X( 5) = (  6.71264824926156E-01,  3.37870130551514E-02)
-
-PATH NUMBER =      5505
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.37186638930154E-01,  7.69968331391110E-02)
-X( 2) = ( -1.39668570753091E+00,  5.38581275350300E-01)
-X( 3) = ( -1.26345215688902E-02, -3.56998230991528E-01)
-X( 4) = ( -9.76385912394041E-02,  5.97468190394504E-01)
-
-X( 5) = (  5.17628878110849E-01, -2.36893611222785E-02)
-
-PATH NUMBER =      5506
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.39222552094770E-01, -2.55942154204995E-01)
-X( 2) = ( -1.23877400875837E+00,  1.66308664029437E-01)
-X( 3) = ( -3.27919919185539E-01, -2.26584898878043E-01)
-X( 4) = ( -1.05521720985723E-01,  5.09623987125785E-01)
-
-X( 5) = (  4.39385087857375E-01, -1.01056536417674E-01)
-
-PATH NUMBER =      5507
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.32269037851775E-02, -5.12296875114221E-01)
-X( 2) = ( -8.78514407427493E-01, -1.73650178027639E-02)
-X( 3) = ( -6.53270620046814E-01, -3.29344037606954E-01)
-X( 4) = ( -5.50953832783587E-02,  4.37264245225084E-01)
-
-X( 5) = (  3.96527232012329E-01, -1.83331244446240E-01)
-
-PATH NUMBER =      5508
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.00754267190764E-01, -5.72116106609772E-01)
-X( 2) = ( -4.84476374840467E-01,  7.35031868885777E-02)
-X( 3) = ( -8.36451415349454E-01, -6.17193504126388E-01)
-X( 4) = (  3.00453780430959E-02,  4.14246892116691E-01)
-
-X( 5) = (  3.78263182970800E-01, -2.78204474969461E-01)
-
-PATH NUMBER =      5509
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.59488823628023E-01, -2.06669879523976E-01)
-X( 2) = ( -4.15229927370232E-01,  1.61080332987018E-01)
-X( 3) = ( -2.41504458526422E-01, -1.42945909922539E+00)
-X( 4) = ( -4.76797204533475E-01,  4.68176825949556E-01)
-
-X( 5) = ( -3.22775667691979E-02, -5.30886790153874E-01)
-
-PATH NUMBER =      5510
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.07527379637551E+00,  1.05494106742853E-01)
-X( 2) = ( -4.36293653562366E-01,  5.64911140612915E-01)
-X( 3) = (  1.01629165144613E-02, -1.65984150194587E+00)
-X( 4) = ( -4.39344998689864E-01,  5.48027186374298E-01)
-
-X( 5) = ( -1.75619082937402E-01, -5.83084452245130E-01)
-
-PATH NUMBER =      5511
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.63315088782725E-01,  4.19050739634404E-01)
-X( 2) = ( -7.12006843514865E-01,  8.60723984544849E-01)
-X( 3) = (  3.51038264637410E-01, -1.67455599090368E+00)
-X( 4) = ( -4.61981766830847E-01,  6.33269925130422E-01)
-
-X( 5) = ( -3.60660765713039E-01, -7.22290636128745E-01)
-
-PATH NUMBER =      5512
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.75999424414771E-01,  5.87283385826914E-01)
-X( 2) = ( -1.11336023143817E+00,  9.10104747513511E-01)
-X( 3) = (  6.21622222048189E-01, -1.46671749318213E+00)
-X( 4) = ( -5.34115513563602E-01,  6.84019017386422E-01)
-
-X( 5) = ( -5.34132591589135E-01, -1.18516833487852E+00)
-
-PATH NUMBER =      5513
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.47764995787337E-01,  5.31474120469311E-01)
-X( 2) = ( -1.45255610657692E+00,  6.89947621719815E-01)
-X( 3) = (  6.95305547868580E-01, -1.13357595173274E+00)
-X( 4) = ( -6.21994057114577E-01,  6.76528398862382E-01)
-
-X( 5) = (  4.10242105273167E-01, -1.74821408455377E+00)
-
-PATH NUMBER =      5514
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.32196339974535E-01,  2.77736719073311E-01)
-X( 2) = ( -1.57088094921144E+00,  3.03266573096540E-01)
-X( 3) = (  5.37610995048272E-01, -8.31011996255495E-01)
-X( 4) = ( -6.84498050295049E-01,  6.14303013214652E-01)
-
-X( 5) = (  6.93053743634127E-01, -8.58752916569127E-01)
-
-PATH NUMBER =      5515
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.30160426809919E-01, -5.52022682707957E-02)
-X( 2) = ( -1.41296925043891E+00, -6.90060382243236E-02)
-X( 3) = (  2.22325597431623E-01, -7.00598664142010E-01)
-X( 4) = ( -6.92381180041369E-01,  5.26458809945933E-01)
-
-X( 5) = (  4.25733583064974E-01, -5.90797842940690E-01)
-
-PATH NUMBER =      5516
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.42609882689867E-01, -3.11556989180022E-01)
-X( 2) = ( -1.05270964910803E+00, -2.52679720056525E-01)
-X( 3) = ( -1.03025103429652E-01, -8.03357802870920E-01)
-X( 4) = ( -6.41954842334004E-01,  4.54099068045231E-01)
-
-X( 5) = (  2.39213545232659E-01, -5.24854000179809E-01)
-
-PATH NUMBER =      5517
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.70137246095453E-01, -3.71376220675572E-01)
-X( 2) = ( -6.58671616521003E-01, -1.61811515365183E-01)
-X( 3) = ( -2.86205898732292E-01, -1.09120726939035E+00)
-X( 4) = ( -5.56814081012550E-01,  4.31081714936838E-01)
-
-X( 5) = (  9.75888745621178E-02, -5.13728025407409E-01)
-
-PATH NUMBER =      5518
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.79327450016086E-01,  9.05866078719220E-02)
-X( 2) = ( -2.82401611854316E-01,  1.44506399059072E-01)
-X( 3) = ( -3.40387743039971E-02, -1.53947959996295E+00)
-X( 4) = ( -6.90376529423756E-01,  1.92374349427825E-01)
-
-X( 5) = ( -2.63880294213809E-01, -5.94477941901601E-01)
-
-PATH NUMBER =      5519
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.09511242276357E+00,  4.02750594138751E-01)
-X( 2) = ( -3.03465338046450E-01,  5.48337206684969E-01)
-X( 3) = (  2.17628600736886E-01, -1.76986200268343E+00)
-X( 4) = ( -6.52924323580145E-01,  2.72224709852567E-01)
-
-X( 5) = ( -4.51271585300210E-01, -5.05281373165362E-01)
-
-PATH NUMBER =      5520
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.83153715170788E-01,  7.16307227030302E-01)
-X( 2) = ( -5.79178527998949E-01,  8.44150050616903E-01)
-X( 3) = (  5.58503948859835E-01, -1.78457649164123E+00)
-X( 4) = ( -6.75561091721127E-01,  3.57467448608691E-01)
-
-X( 5) = ( -6.92317451886404E-01, -4.14692560670357E-01)
-
-PATH NUMBER =      5521
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.95838050802834E-01,  8.84539873222812E-01)
-X( 2) = ( -9.80531915922253E-01,  8.93530813585565E-01)
-X( 3) = (  8.29087906270614E-01, -1.57673799391968E+00)
-X( 4) = ( -7.47694838453883E-01,  4.08216540864691E-01)
-
-X( 5) = ( -1.12392743103351E+00, -3.12885145881449E-01)
-
-PATH NUMBER =      5522
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.67603622175400E-01,  8.28730607865209E-01)
-X( 2) = ( -1.31972779106100E+00,  6.73373687791869E-01)
-X( 3) = (  9.02771232091006E-01, -1.24359645247029E+00)
-X( 4) = ( -8.35573382004858E-01,  4.00725922340651E-01)
-
-X( 5) = ( -2.52828418569748E+00, -4.67492357598078E-01)
-
-PATH NUMBER =      5523
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.52034966362598E-01,  5.74993206469209E-01)
-X( 2) = ( -1.43805263369553E+00,  2.86692639168593E-01)
-X( 3) = (  7.45076679270698E-01, -9.41032496993047E-01)
-X( 4) = ( -8.98077375185330E-01,  3.38500536692921E-01)
-
-X( 5) = (  1.02186790798365E+00, -4.01843077740734E+00)
-
-PATH NUMBER =      5524
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.49999053197982E-01,  2.42054219125103E-01)
-X( 2) = ( -1.28014093492299E+00, -8.55799721522698E-02)
-X( 3) = (  4.29791281654049E-01, -8.10619164879562E-01)
-X( 4) = ( -9.05960504931649E-01,  2.50656333424201E-01)
-
-X( 5) = (  5.87542738995090E-01, -1.28801851503046E+00)
-
-PATH NUMBER =      5525
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.62448509077930E-01, -1.43005017841234E-02)
-X( 2) = ( -9.19881333592113E-01, -2.69253653984471E-01)
-X( 3) = (  1.04440580792774E-01, -9.13378303608473E-01)
-X( 4) = ( -8.55534167224285E-01,  1.78296591523500E-01)
-
-X( 5) = (  1.65178889695035E-01, -8.72780976341943E-01)
-
-PATH NUMBER =      5526
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.89975872483515E-01, -7.41197332796744E-02)
-X( 2) = ( -5.25843301005087E-01, -1.78385449293129E-01)
-X( 3) = ( -7.87402145098666E-02, -1.20122777012791E+00)
-X( 4) = ( -7.70393405902830E-01,  1.55279238415107E-01)
-
-X( 5) = ( -7.62421780412209E-02, -7.02294218695194E-01)
-
-PATH NUMBER =      5527
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.03451932522749E-01,  3.31050311458063E-01)
-X( 2) = ( -1.69995699491848E-01,  2.17190424502113E-01)
-X( 3) = (  1.95608974918075E-01, -1.49040382192880E+00)
-X( 4) = ( -6.76705369792027E-01, -1.56188748834787E-01)
-
-X( 5) = ( -6.97811015765118E-01, -7.03044370427985E-01)
-
-PATH NUMBER =      5528
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.19236905270234E-01,  6.43214297724892E-01)
-X( 2) = ( -1.91059425683982E-01,  6.21021232128010E-01)
-X( 3) = (  4.47276349958960E-01, -1.72078622464928E+00)
-X( 4) = ( -6.39253163948416E-01, -7.63383884100457E-02)
-
-X( 5) = ( -8.13446666043237E-01, -3.13161376209321E-01)
-
-PATH NUMBER =      5529
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.07278197677450E-01,  9.56770930616443E-01)
-X( 2) = ( -4.66772615636481E-01,  9.16834076059944E-01)
-X( 3) = (  7.88151698081908E-01, -1.73550071360709E+00)
-X( 4) = ( -6.61889932089399E-01,  8.90435034607782E-03)
-
-X( 5) = ( -8.67475915946385E-01,  3.92222907163866E-02)
-
-PATH NUMBER =      5530
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.19962533309496E-01,  1.12500357680895E+00)
-X( 2) = ( -8.68126003559785E-01,  9.66214839028605E-01)
-X( 3) = (  1.05873565549269E+00, -1.52766221588553E+00)
-X( 4) = ( -7.34023678822153E-01,  5.96534426020787E-02)
-
-X( 5) = ( -8.74322846968142E-01,  4.39374667132726E-01)
-
-PATH NUMBER =      5531
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.91728104682064E-01,  1.06919431145135E+00)
-X( 2) = ( -1.20732187869853E+00,  7.46057713234909E-01)
-X( 3) = (  1.13241898131308E+00, -1.19452067443614E+00)
-X( 4) = ( -8.21902222373128E-01,  5.21628240780389E-02)
-
-X( 5) = ( -7.79531949642382E-01,  1.02540356238063E+00)
-
-PATH NUMBER =      5532
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.38405511307391E-02,  8.15456910055350E-01)
-X( 2) = ( -1.32564672133306E+00,  3.59376664611634E-01)
-X( 3) = (  9.74724428492770E-01, -8.91956718958900E-01)
-X( 4) = ( -8.84406215553601E-01, -1.00625615696920E-02)
-
-X( 5) = ( -1.34528257729862E-01,  2.18944907636777E+00)
-
-PATH NUMBER =      5533
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.58764642953556E-02,  4.82517922711243E-01)
-X( 2) = ( -1.16773502256053E+00, -1.28959467092292E-02)
-X( 3) = (  6.59439030876121E-01, -7.61543386845416E-01)
-X( 4) = ( -8.92289345299920E-01, -9.79067648384111E-02)
-
-X( 5) = (  4.62778109039733E+00,  1.03676026483698E+00)
-
-PATH NUMBER =      5534
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.86572991584593E-01,  2.26163201802018E-01)
-X( 2) = ( -8.07475421229645E-01, -1.96569628541430E-01)
-X( 3) = (  3.34088330014846E-01, -8.64302525574327E-01)
-X( 4) = ( -8.41863007592555E-01, -1.70266506739113E-01)
-
-X( 5) = (  6.44941526089545E-01, -2.20742747585902E+00)
-
-PATH NUMBER =      5535
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.14100354990179E-01,  1.66343970306467E-01)
-X( 2) = ( -4.13437388642619E-01, -1.05701423850088E-01)
-X( 3) = (  1.50907534712206E-01, -1.15215199209376E+00)
-X( 4) = ( -7.56722246271101E-01, -1.93283859847505E-01)
-
-X( 5) = ( -4.18415391746609E-01, -1.25181404937885E+00)
-
-PATH NUMBER =      5536
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.14156380421795E-01,  4.02205591870111E-01)
-X( 2) = ( -1.30608165929787E-01,  3.45122746018378E-01)
-X( 3) = (  3.39984055028349E-01, -1.30519486708165E+00)
-X( 4) = ( -4.42180613167989E-01, -4.14415921313874E-01)
-
-X( 5) = ( -2.57792028653709E+00, -1.02003451351806E+00)
-
-PATH NUMBER =      5537
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.29941353169280E-01,  7.14369578136940E-01)
-X( 2) = ( -1.51671892121921E-01,  7.48953553644275E-01)
-X( 3) = (  5.91651430069233E-01, -1.53557726980213E+00)
-X( 4) = ( -4.04728407324378E-01, -3.34565560889132E-01)
-
-X( 5) = ( -1.35636661724828E+00,  3.34980506012675E-01)
-
-PATH NUMBER =      5538
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.17982645576497E-01,  1.02792621102849E+00)
-X( 2) = ( -4.27385082074420E-01,  1.04476639757621E+00)
-X( 3) = (  9.32526778192181E-01, -1.55029175875994E+00)
-X( 4) = ( -4.27365175465361E-01, -2.49322822133009E-01)
-
-X( 5) = ( -7.71305295412690E-01,  6.33070908338750E-01)
-
-PATH NUMBER =      5539
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.30666981208543E-01,  1.19615885722100E+00)
-X( 2) = ( -8.28738469997724E-01,  1.09414716054487E+00)
-X( 3) = (  1.20311073560296E+00, -1.34245326103839E+00)
-X( 4) = ( -4.99498922198116E-01, -1.98573729877008E-01)
-
-X( 5) = ( -3.90545136076957E-01,  7.57794115786134E-01)
-
-PATH NUMBER =      5540
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.75674474188901E-02,  1.14034959186340E+00)
-X( 2) = ( -1.16793434513647E+00,  8.73990034751175E-01)
-X( 3) = (  1.27679406142335E+00, -1.00931171958899E+00)
-X( 4) = ( -5.87377465749091E-01, -2.06064348401048E-01)
-
-X( 5) = ( -6.47314911082872E-02,  8.26994073593055E-01)
-
-PATH NUMBER =      5541
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.13136103231693E-01,  8.86612190467398E-01)
-X( 2) = ( -1.28625918777100E+00,  4.87308986127899E-01)
-X( 3) = (  1.11909950860304E+00, -7.06747764111753E-01)
-X( 4) = ( -6.49881458929563E-01, -2.68289734048779E-01)
-
-X( 5) = (  2.89820401793960E-01,  8.65598735540605E-01)
-
-PATH NUMBER =      5542
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.15172016396309E-01,  5.53673203123291E-01)
-X( 2) = ( -1.12834748899846E+00,  1.15036374807036E-01)
-X( 3) = (  8.03814110986395E-01, -5.76334431998268E-01)
-X( 4) = ( -6.57764588675882E-01, -3.56133937317498E-01)
-
-X( 5) = (  7.91261471351491E-01,  8.57059550740414E-01)
-
-PATH NUMBER =      5543
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.02722560516361E-01,  2.97318482214065E-01)
-X( 2) = ( -7.68087887667584E-01, -6.86373070251646E-02)
-X( 3) = (  4.78463410125120E-01, -6.79093570727179E-01)
-X( 4) = ( -6.07338250968518E-01, -4.28493679218199E-01)
-
-X( 5) = (  1.80714485706833E+00,  6.04202443440620E-01)
-
-PATH NUMBER =      5544
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.24804802889225E-01,  2.37499250718514E-01)
-X( 2) = ( -3.74049855080559E-01,  2.22308976661771E-02)
-X( 3) = (  2.95282614822479E-01, -9.66943037246613E-01)
-X( 4) = ( -5.22197489647063E-01, -4.51511032326592E-01)
-
-X( 5) = (  3.71005029772064E+00, -3.68732715556999E+00)
-
-PATH NUMBER =      5545
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.46805397703187E-01,  2.70758102600412E-01)
-X( 2) = ( -1.82668875865499E-01,  4.68442408561029E-01)
-X( 3) = (  3.31531761492941E-01, -1.07051406376273E+00)
-X( 4) = ( -9.65389996283682E-02, -4.61479804131121E-01)
-
-X( 5) = (  2.90730755816842E+00,  6.47249460339316E-01)
-
-PATH NUMBER =      5546
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.62590370450672E-01,  5.82922088867242E-01)
-X( 2) = ( -2.03732602057633E-01,  8.72273216186926E-01)
-X( 3) = (  5.83199136533825E-01, -1.30089646648321E+00)
-X( 4) = ( -5.90867937847576E-02, -3.81629443706380E-01)
-
-X( 5) = ( -2.21580287068226E-01,  2.63186712792226E+00)
-
-PATH NUMBER =      5547
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.50631662857889E-01,  8.96478721758792E-01)
-X( 2) = ( -4.79445792010132E-01,  1.16808606011886E+00)
-X( 3) = (  9.24074484656773E-01, -1.31561095544102E+00)
-X( 4) = ( -8.17235619257400E-02, -2.96386704950256E-01)
-
-X( 5) = ( -1.54785077014215E-01,  1.16786619343114E+00)
-
-PATH NUMBER =      5548
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.66840015100647E-02,  1.06471136795130E+00)
-X( 2) = ( -8.80799179933436E-01,  1.21746682308752E+00)
-X( 3) = (  1.19465844206755E+00, -1.10777245771947E+00)
-X( 4) = ( -1.53857308658495E-01, -2.45637612694255E-01)
-
-X( 5) = (  7.98832290904142E-02,  7.93012232138173E-01)
-
-PATH NUMBER =      5549
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.64918430137498E-01,  1.00890210259370E+00)
-X( 2) = ( -1.21999505507218E+00,  9.97309697293826E-01)
-X( 3) = (  1.26834176788794E+00, -7.74630916270078E-01)
-X( 4) = ( -2.41735852209470E-01, -2.53128231218296E-01)
-
-X( 5) = (  2.46886613650160E-01,  6.10662246522225E-01)
-
-PATH NUMBER =      5550
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.80487085950301E-01,  7.55164701197699E-01)
-X( 2) = ( -1.33831989770671E+00,  6.10628648670550E-01)
-X( 3) = (  1.11064721506764E+00, -4.72066960792836E-01)
-X( 4) = ( -3.04239845389943E-01, -3.15353616866026E-01)
-
-X( 5) = (  3.93248121477360E-01,  4.84098381396365E-01)
-
-PATH NUMBER =      5551
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.82522999114917E-01,  4.22225713853593E-01)
-X( 2) = ( -1.18040819893418E+00,  2.38356037349687E-01)
-X( 3) = (  7.95361817450987E-01, -3.41653628679352E-01)
-X( 4) = ( -3.12122975136262E-01, -4.03197820134745E-01)
-
-X( 5) = (  5.53838069347036E-01,  3.71804073172632E-01)
-
-PATH NUMBER =      5552
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.70073543234969E-01,  1.65870992944367E-01)
-X( 2) = ( -8.20148597603296E-01,  5.46823555174863E-02)
-X( 3) = (  4.70011116589712E-01, -4.44412767408263E-01)
-X( 4) = ( -2.61696637428897E-01, -4.75557562035447E-01)
-
-X( 5) = (  7.81189414102862E-01,  2.50391599491046E-01)
-
-PATH NUMBER =      5553
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.25461798293830E-02,  1.06051761448816E-01)
-X( 2) = ( -4.26110565016270E-01,  1.45550560208828E-01)
-X( 3) = (  2.86830321287071E-01, -7.32262233927696E-01)
-X( 4) = ( -1.76555876107443E-01, -4.98574915143840E-01)
-
-X( 5) = (  1.24222408035498E+00,  1.10275168897011E-01)
-
-PATH NUMBER =      5554
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.26495480456166E-01, -1.78641524562239E-03)
-X( 2) = ( -3.01818044529721E-01,  5.29446771480974E-01)
-X( 3) = (  1.74207016393848E-01, -8.96171168031575E-01)
-X( 4) = (  1.98489918473001E-01, -2.75358683459545E-01)
-
-X( 5) = (  9.92577202458026E-01, -2.00722068103438E-01)
-
-PATH NUMBER =      5555
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.42280453203651E-01,  3.10377571021207E-01)
-X( 2) = ( -3.22881770721855E-01,  9.33277579106871E-01)
-X( 3) = (  4.25874391434732E-01, -1.12655357075205E+00)
-X( 4) = (  2.35942124316612E-01, -1.95508323034804E-01)
-
-X( 5) = (  1.59287072938982E+00,  2.84305344188791E-01)
-
-PATH NUMBER =      5556
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.30321745610868E-01,  6.23934203912758E-01)
-X( 2) = ( -5.98594960674354E-01,  1.22909042303881E+00)
-X( 3) = (  7.66749739557680E-01, -1.14126805970986E+00)
-X( 4) = (  2.13305356175630E-01, -1.10265584278680E-01)
-
-X( 5) = (  8.70120320486907E-01,  9.42769234278557E-01)
-
-PATH NUMBER =      5557
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.56993918757086E-01,  7.92166850105267E-01)
-X( 2) = ( -9.99948348597658E-01,  1.27847118600747E+00)
-X( 3) = (  1.03733369696846E+00, -9.33429561988308E-01)
-X( 4) = (  1.41171609442875E-01, -5.95164920226792E-02)
-
-X( 5) = (  4.95306412545884E-01,  6.33517890769040E-01)
-
-PATH NUMBER =      5558
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.85228347384519E-01,  7.36357584747664E-01)
-X( 2) = ( -1.33914422373640E+00,  1.05831406021377E+00)
-X( 3) = (  1.11101702278885E+00, -6.00288020538917E-01)
-X( 4) = (  5.32930658918995E-02, -6.70071105467195E-02)
-
-X( 5) = (  4.38264045553005E-01,  4.12745445646928E-01)
-
-PATH NUMBER =      5559
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.00797003197322E-01,  4.82620183351665E-01)
-X( 2) = ( -1.45746906637093E+00,  6.71633011590495E-01)
-X( 3) = (  9.53322469968543E-01, -2.97724065061676E-01)
-X( 4) = ( -9.21092728857279E-03, -1.29232496194450E-01)
-
-X( 5) = (  4.48873852243135E-01,  2.65280715837935E-01)
-
-PATH NUMBER =      5560
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.02832916361939E-01,  1.49681196007558E-01)
-X( 2) = ( -1.29955736759840E+00,  2.99360400269632E-01)
-X( 3) = (  6.38037072351894E-01, -1.67310732948191E-01)
-X( 4) = ( -1.70940570348921E-02, -2.17076699463169E-01)
-
-X( 5) = (  4.86542612770941E-01,  1.46330033128226E-01)
-
-PATH NUMBER =      5561
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.90383460481990E-01, -1.06673524901668E-01)
-X( 2) = ( -9.39297766267518E-01,  1.15686718437431E-01)
-X( 3) = (  3.12686371490619E-01, -2.70069871677102E-01)
-X( 4) = (  3.33322806724724E-02, -2.89436441363871E-01)
-
-X( 5) = (  5.53418057191203E-01,  3.17692885565446E-02)
-
-PATH NUMBER =      5562
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.62856097076404E-01, -1.66492756397219E-01)
-X( 2) = ( -5.45259733680492E-01,  2.06554923128773E-01)
-X( 3) = (  1.29505576187978E-01, -5.57919338196536E-01)
-X( 4) = (  1.18473041993927E-01, -3.12453794472264E-01)
-
-X( 5) = (  6.82091161098115E-01, -9.37586805321173E-02)
-
-PATH NUMBER =      5563
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.09520976056405E-01, -2.87901352772917E-01)
-X( 2) = ( -4.32304451708956E-01,  4.99591215379997E-01)
-X( 3) = ( -5.83761835672831E-02, -8.63743158406238E-01)
-X( 4) = (  3.04858831475298E-01,  5.68592998327771E-02)
-
-X( 5) = (  5.55616562795112E-01, -3.51393968111175E-01)
-
-PATH NUMBER =      5564
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.25305948803890E-01,  2.42626334939126E-02)
-X( 2) = ( -4.53368177901090E-01,  9.03422023005895E-01)
-X( 3) = (  1.93291191473600E-01, -1.09412556112672E+00)
-X( 4) = (  3.42311037318908E-01,  1.36709660257519E-01)
-
-X( 5) = (  8.29483475398557E-01, -4.55655344276549E-01)
-
-PATH NUMBER =      5565
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.13347241211106E-01,  3.37819266385463E-01)
-X( 2) = ( -7.29081367853588E-01,  1.19923486693783E+00)
-X( 3) = (  5.34166539596548E-01, -1.10884005008453E+00)
-X( 4) = (  3.19674269177926E-01,  2.21952399013642E-01)
-
-X( 5) = (  1.17828639270610E+00, -6.20051423736913E-02)
-
-PATH NUMBER =      5566
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.39684231568477E-02,  5.06051912577974E-01)
-X( 2) = ( -1.13043475577689E+00,  1.24861562990649E+00)
-X( 3) = (  8.04750497007328E-01, -9.01001552362972E-01)
-X( 4) = (  2.47540522445171E-01,  2.72701491269643E-01)
-
-X( 5) = (  8.30030268835205E-01,  2.77535123520810E-01)
-
-PATH NUMBER =      5567
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.02202851784281E-01,  4.50242647220370E-01)
-X( 2) = ( -1.46963063091564E+00,  1.02845850411279E+00)
-X( 3) = (  8.78433822827719E-01, -5.67860010913580E-01)
-X( 4) = (  1.59661978894195E-01,  2.65210872745603E-01)
-
-X( 5) = (  5.86502922234728E-01,  2.00307774442522E-01)
-
-PATH NUMBER =      5568
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.17771507597083E-01,  1.96505245824370E-01)
-X( 2) = ( -1.58795547355017E+00,  6.41777455489518E-01)
-X( 3) = (  7.20739270007411E-01, -2.65296055436340E-01)
-X( 4) = (  9.71579857137231E-02,  2.02985487097872E-01)
-
-X( 5) = (  4.91624464242017E-01,  8.95112584295058E-02)
-
-PATH NUMBER =      5569
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.19807420761699E-01, -1.36433741519737E-01)
-X( 2) = ( -1.43004377477763E+00,  2.69504844168655E-01)
-X( 3) = (  4.05453872390762E-01, -1.34882723322855E-01)
-X( 4) = (  8.92748559674038E-02,  1.15141283829153E-01)
-
-X( 5) = (  4.53786481768527E-01, -1.03955687641846E-02)
-
-PATH NUMBER =      5570
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.07357964881752E-01, -3.92788462428962E-01)
-X( 2) = ( -1.06978417344675E+00,  8.58311623364549E-02)
-X( 3) = (  8.01031715294874E-02, -2.37641862051766E-01)
-X( 4) = (  1.39701193674768E-01,  4.27815419284516E-02)
-
-X( 5) = (  4.45756172988178E-01, -1.08127831630303E-01)
-
-PATH NUMBER =      5571
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.98306014761659E-02, -4.52607693924513E-01)
-X( 2) = ( -6.75746140859727E-01,  1.76699367027796E-01)
-X( 3) = ( -1.03077623773153E-01, -5.25491328571200E-01)
-X( 4) = (  2.24841954996223E-01,  1.97641888200587E-02)
-
-X( 5) = (  4.68421961442032E-01, -2.17363375063767E-01)
-
-PATH NUMBER =      5572
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.57033332386949E-01, -4.53710350899117E-01)
-X( 2) = ( -5.13072057289160E-01,  3.92845486765293E-01)
-X( 3) = ( -2.57389574254301E-01, -9.88403460987602E-01)
-X( 4) = (  1.72796542825958E-01,  3.79725659171756E-01)
-
-X( 5) = (  3.23252467165856E-01, -4.25475027909332E-01)
-
-PATH NUMBER =      5573
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.72818305134434E-01, -1.41546364632288E-01)
-X( 2) = ( -5.34135783481294E-01,  7.96676294391190E-01)
-X( 3) = ( -5.72219921341709E-03, -1.21878586370808E+00)
-X( 4) = (  2.10248748669569E-01,  4.59576019596498E-01)
-
-X( 5) = (  3.85708060419620E-01, -5.91962780760419E-01)
-
-PATH NUMBER =      5574
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.60859597541651E-01,  1.72010268259263E-01)
-X( 2) = ( -8.09848973433793E-01,  1.09248913832312E+00)
-X( 3) = (  3.35153148909531E-01, -1.23350035266589E+00)
-X( 4) = (  1.87611980528586E-01,  5.44818758352621E-01)
-
-X( 5) = (  6.92286425081357E-01, -7.21005202456973E-01)
-
-PATH NUMBER =      5575
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.73543933173697E-01,  3.40242914451773E-01)
-X( 2) = ( -1.21120236135710E+00,  1.14186990129179E+00)
-X( 3) = (  6.05737106320310E-01, -1.02566185494434E+00)
-X( 4) = (  1.15478233795831E-01,  5.95567850608622E-01)
-
-X( 5) = (  9.64592777601894E-01, -3.26427021484826E-01)
-
-PATH NUMBER =      5576
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.54690495453736E-01,  2.84433649094170E-01)
-X( 2) = ( -1.55039823649584E+00,  9.21712775498090E-01)
-X( 3) = (  6.79420432140701E-01, -6.92520313494945E-01)
-X( 4) = (  2.75996902448559E-02,  5.88077232084582E-01)
-
-X( 5) = (  7.18850928129201E-01, -8.14505245205917E-02)
-
-PATH NUMBER =      5577
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.70259151266539E-01,  3.06962476981701E-02)
-X( 2) = ( -1.66872307913037E+00,  5.35031726874814E-01)
-X( 3) = (  5.21725879320394E-01, -3.89956358017704E-01)
-X( 4) = ( -3.49043029356167E-02,  5.25851846436851E-01)
-
-X( 5) = (  5.34389414963563E-01, -9.37998048914010E-02)
-
-PATH NUMBER =      5578
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.72295064431155E-01, -3.02242739645936E-01)
-X( 2) = ( -1.51081138035784E+00,  1.62759115553952E-01)
-X( 3) = (  2.06440481703745E-01, -2.59543025904219E-01)
-X( 4) = ( -4.27874326819358E-02,  4.38007643168132E-01)
-
-X( 5) = (  4.33384766135626E-01, -1.53881945036938E-01)
-
-PATH NUMBER =      5579
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.59845608551207E-01, -5.58597460555162E-01)
-X( 2) = ( -1.15055177902696E+00, -2.09145662782498E-02)
-X( 3) = ( -1.18910219157530E-01, -3.62302164633130E-01)
-X( 4) = (  7.63890502542864E-03,  3.65647901267431E-01)
-
-X( 5) = (  3.72147788384165E-01, -2.25539962801760E-01)
-
-PATH NUMBER =      5580
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.67681754854379E-01, -6.18416692050713E-01)
-X( 2) = ( -7.56513746439931E-01,  6.99536384130918E-02)
-X( 3) = ( -3.02091014460171E-01, -6.50151631152564E-01)
-X( 4) = (  9.27796663468834E-02,  3.42630548159038E-01)
-
-X( 5) = (  3.34210591158971E-01, -3.11087139802610E-01)
-
-PATH NUMBER =      5581
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.53218767127308E-01, -4.21629536639223E-01)
-X( 2) = ( -5.06328800987406E-01,  2.59157098402308E-01)
-X( 3) = ( -3.29712578377281E-01, -1.21182213475291E+00)
-X( 4) = ( -1.35903534907141E-01,  5.42167636762793E-01)
-
-X( 5) = (  1.45399025098751E-01, -4.79396649221600E-01)
-
-PATH NUMBER =      5582
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.69003739874792E-01, -1.09465550372394E-01)
-X( 2) = ( -5.27392527179540E-01,  6.62987906028204E-01)
-X( 3) = ( -7.80452033363968E-02, -1.44220453747339E+00)
-X( 4) = ( -9.84513290635299E-02,  6.22017997187534E-01)
-
-X( 5) = (  8.36922381810639E-02, -6.11240182321175E-01)
-
-PATH NUMBER =      5583
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.57045032282009E-01,  2.04091082519157E-01)
-X( 2) = ( -8.03105717132039E-01,  9.58800749960138E-01)
-X( 3) = (  2.62830144786552E-01, -1.45691902643120E+00)
-X( 4) = ( -1.21088097204512E-01,  7.07260735943658E-01)
-
-X( 5) = (  1.05900344439644E-01, -8.62878933391880E-01)
-
-PATH NUMBER =      5584
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.69729367914055E-01,  3.72323728711666E-01)
-X( 2) = ( -1.20445910505534E+00,  1.00818151292880E+00)
-X( 3) = (  5.33414102197330E-01, -1.24908052870964E+00)
-X( 4) = ( -1.93221843937267E-01,  7.58009828199659E-01)
-
-X( 5) = (  5.53021474145144E-01, -1.07680769737969E+00)
-
-PATH NUMBER =      5585
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.41494939286622E-01,  3.16514463354063E-01)
-X( 2) = ( -1.54365498019409E+00,  7.88024387135105E-01)
-X( 3) = (  6.07097428017721E-01, -9.15938987260251E-01)
-X( 4) = ( -2.81100387488243E-01,  7.50519209675619E-01)
-
-X( 5) = (  8.16645761135232E-01, -5.72850381888191E-01)
-
-PATH NUMBER =      5586
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.40737165261803E-02,  6.27770619580637E-02)
-X( 2) = ( -1.66197982282862E+00,  4.01343338511829E-01)
-X( 3) = (  4.49402875197414E-01, -6.13375031783010E-01)
-X( 4) = ( -3.43604380668715E-01,  6.88293824027888E-01)
-
-X( 5) = (  5.90044713792163E-01, -3.45223494561123E-01)
-
-PATH NUMBER =      5587
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.61096296907967E-02, -2.70161925386043E-01)
-X( 2) = ( -1.50406812405608E+00,  2.90707271909658E-02)
-X( 3) = (  1.34117477580765E-01, -4.82961699669525E-01)
-X( 4) = ( -3.51487510415035E-01,  6.00449620759169E-01)
-
-X( 5) = (  4.20784731611410E-01, -3.22734029733856E-01)
-
-PATH NUMBER =      5588
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.36339826189151E-01, -5.26516646295268E-01)
-X( 2) = ( -1.14380852272520E+00, -1.54602954641236E-01)
-X( 3) = ( -1.91233223280509E-01, -5.85720838398436E-01)
-X( 4) = ( -3.01061172707670E-01,  5.28089878858467E-01)
-
-X( 5) = (  3.07676735449310E-01, -3.50943426914784E-01)
-
-PATH NUMBER =      5589
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.63867189594737E-01, -5.86335877790819E-01)
-X( 2) = ( -7.49770490138178E-01, -6.37347499498938E-02)
-X( 3) = ( -3.74414018583150E-01, -8.73570304917870E-01)
-X( 4) = ( -2.15920411386215E-01,  5.05072525750074E-01)
-
-X( 5) = (  2.20658770008010E-01, -4.01731845207076E-01)
-
-PATH NUMBER =      5590
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.01697641985234E+00, -1.76994651687258E-01)
-X( 2) = ( -5.30242164807495E-01, -1.14577796149327E-01)
-X( 3) = (  2.77232552739403E-01, -1.32886320896312E+00)
-X( 4) = ( -7.23599522664640E-01,  3.79649536035240E-01)
-
-X( 5) = ( -2.13593116805759E-01, -3.99238676857471E-01)
-
-PATH NUMBER =      5591
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13276139259983E+00,  1.35169334579571E-01)
-X( 2) = ( -5.51305890999629E-01,  2.89253011476570E-01)
-X( 3) = (  5.28899927780286E-01, -1.55924561168360E+00)
-X( 4) = ( -6.86147316821029E-01,  4.59499896459982E-01)
-
-X( 5) = ( -3.00498806974550E-01, -3.52333108742609E-01)
-
-PATH NUMBER =      5592
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02080268500704E+00,  4.48725967471122E-01)
-X( 2) = ( -8.27019080952128E-01,  5.85065855408504E-01)
-X( 3) = (  8.69775275903235E-01, -1.57396010064141E+00)
-X( 4) = ( -7.08784084962012E-01,  5.44742635216105E-01)
-
-X( 5) = ( -4.13327844627155E-01, -3.28982356650702E-01)
-
-PATH NUMBER =      5593
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.33487020639089E-01,  6.16958613663631E-01)
-X( 2) = ( -1.22837246887543E+00,  6.34446618377166E-01)
-X( 3) = (  1.14035923331401E+00, -1.36612160291986E+00)
-X( 4) = ( -7.80917831694766E-01,  5.95491727472107E-01)
-
-X( 5) = ( -5.80396416636267E-01, -3.60229987026406E-01)
-
-PATH NUMBER =      5594
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.05252592011656E-01,  5.61149348306028E-01)
-X( 2) = ( -1.56756834401418E+00,  4.14289492583470E-01)
-X( 3) = (  1.21404255913440E+00, -1.03298006147047E+00)
-X( 4) = ( -8.68796375245742E-01,  5.88001108948067E-01)
-
-X( 5) = ( -7.87607330310998E-01, -6.02944413931887E-01)
-
-PATH NUMBER =      5595
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.89683936198853E-01,  3.07411946910029E-01)
-X( 2) = ( -1.68589318664871E+00,  2.76084439601941E-02)
-X( 3) = (  1.05634800631410E+00, -7.30416105993226E-01)
-X( 4) = ( -9.31300368426214E-01,  5.25775723300336E-01)
-
-X( 5) = ( -4.90899094888675E-01, -1.06198878569421E+00)
-
-PATH NUMBER =      5596
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87648023034237E-01, -2.55270404340777E-02)
-X( 2) = ( -1.52798148787617E+00, -3.44664167360668E-01)
-X( 3) = (  7.41062608697448E-01, -6.00002773879742E-01)
-X( 4) = ( -9.39183498172533E-01,  4.37931520031617E-01)
-
-X( 5) = ( -8.80131764402097E-02, -8.34762785628845E-01)
-
-PATH NUMBER =      5597
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.00097478914185E-01, -2.81881761343304E-01)
-X( 2) = ( -1.16772188654529E+00, -5.28337849192870E-01)
-X( 3) = (  4.15711907836173E-01, -7.02761912608653E-01)
-X( 4) = ( -8.88757160465169E-01,  3.65571778130915E-01)
-
-X( 5) = ( -7.56175243206923E-02, -5.97125419108963E-01)
-
-PATH NUMBER =      5598
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.27624842319771E-01, -3.41700992838854E-01)
-X( 2) = ( -7.73683853958267E-01, -4.37469644501529E-01)
-X( 3) = (  2.32531112533533E-01, -9.90611379128086E-01)
-X( 4) = ( -8.03616399143714E-01,  3.42554425022522E-01)
-
-X( 5) = ( -1.38349735676648E-01, -4.72456698633629E-01)
-
-PATH NUMBER =      5599
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.03681504624040E+00,  1.20261835708639E-01)
-X( 2) = ( -3.97413849291580E-01, -1.31151730077273E-01)
-X( 3) = (  4.84698236961828E-01, -1.43888370970068E+00)
-X( 4) = ( -9.37178847554920E-01,  1.03847059513510E-01)
-
-X( 5) = ( -3.38345879346169E-01, -3.21862552411789E-01)
-
-PATH NUMBER =      5600
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15260001898789E+00,  4.32425821975468E-01)
-X( 2) = ( -4.18477575483714E-01,  2.72679077548624E-01)
-X( 3) = (  7.36365612002711E-01, -1.66926611242116E+00)
-X( 4) = ( -8.99726641711310E-01,  1.83697419938252E-01)
-
-X( 5) = ( -3.80328724736926E-01, -2.33174519119956E-01)
-
-PATH NUMBER =      5601
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04064131139511E+00,  7.45982454867019E-01)
-X( 2) = ( -6.94190765436213E-01,  5.68491921480557E-01)
-X( 3) = (  1.07724096012566E+00, -1.68398060137896E+00)
-X( 4) = ( -9.22363409852292E-01,  2.68940158694375E-01)
-
-X( 5) = ( -4.46001277199020E-01, -1.58485550498854E-01)
-
-PATH NUMBER =      5602
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.53325647027153E-01,  9.14215101059529E-01)
-X( 2) = ( -1.09554415335952E+00,  6.17872684449220E-01)
-X( 3) = (  1.34782491753644E+00, -1.47614210365741E+00)
-X( 4) = ( -9.94497156585047E-01,  3.19689250950376E-01)
-
-X( 5) = ( -5.54015417756944E-01, -9.49584119344308E-02)
-
-PATH NUMBER =      5603
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.25091218399719E-01,  8.58405835701925E-01)
-X( 2) = ( -1.43474002849826E+00,  3.97715558655523E-01)
-X( 3) = (  1.42150824335683E+00, -1.14300056220802E+00)
-X( 4) = ( -1.08237570013602E+00,  3.12198632426336E-01)
-
-X( 5) = ( -7.54458474415948E-01, -8.14177865413215E-02)
-
-PATH NUMBER =      5604
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.09522562586916E-01,  6.04668434305926E-01)
-X( 2) = ( -1.55306487113279E+00,  1.10345100322471E-02)
-X( 3) = (  1.26381369053652E+00, -8.40436606730778E-01)
-X( 4) = ( -1.14487969331650E+00,  2.49973246778605E-01)
-
-X( 5) = ( -1.02561054994034E+00, -3.59559389472232E-01)
-
-PATH NUMBER =      5605
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.07486649422300E-01,  2.71729446961820E-01)
-X( 2) = ( -1.39515317236026E+00, -3.61238101288614E-01)
-X( 3) = (  9.48528292919873E-01, -7.10023274617294E-01)
-X( 4) = ( -1.15276282306281E+00,  1.62129043509886E-01)
-
-X( 5) = ( -6.96166087749971E-01, -7.82550194440335E-01)
-
-PATH NUMBER =      5606
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.19936105302248E-01,  1.53747260525939E-02)
-X( 2) = ( -1.03489357102938E+00, -5.44911783120816E-01)
-X( 3) = (  6.23177592058598E-01, -8.12782413346204E-01)
-X( 4) = ( -1.10233648535545E+00,  8.97693016091842E-02)
-
-X( 5) = ( -3.77907613960523E-01, -6.19051465093737E-01)
-
-PATH NUMBER =      5607
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.47463468707834E-01, -4.44445054429571E-02)
-X( 2) = ( -6.40855538442351E-01, -4.54043578429475E-01)
-X( 3) = (  4.39996796755958E-01, -1.10063187986564E+00)
-X( 4) = ( -1.01719572403399E+00,  6.67519485007912E-02)
-
-X( 5) = ( -3.22352983945477E-01, -4.40928452529693E-01)
-
-PATH NUMBER =      5608
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.60939528747067E-01,  3.60725539294781E-01)
-X( 2) = ( -2.85007936929111E-01, -5.84677046342325E-02)
-X( 3) = (  7.14345986183900E-01, -1.38980793166653E+00)
-X( 4) = ( -9.23507687923191E-01, -2.44716038749103E-01)
-
-X( 5) = ( -4.95784512208773E-01, -2.38127457082190E-01)
-
-PATH NUMBER =      5609
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.76724501494553E-01,  6.72889525561610E-01)
-X( 2) = ( -3.06071663121245E-01,  3.45363102991665E-01)
-X( 3) = (  9.66013361224784E-01, -1.62019033438701E+00)
-X( 4) = ( -8.86055482079581E-01, -1.64865678324362E-01)
-
-X( 5) = ( -4.72797758528143E-01, -1.14237763818705E-01)
-
-PATH NUMBER =      5610
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.64765793901768E-01,  9.86446158453160E-01)
-X( 2) = ( -5.81784853073744E-01,  6.41175946923598E-01)
-X( 3) = (  1.30688870934773E+00, -1.63490482334482E+00)
-X( 4) = ( -9.08692250220562E-01, -7.96229395682383E-02)
-
-X( 5) = ( -4.81155094268521E-01, -4.31995538815776E-03)
-
-PATH NUMBER =      5611
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.77450129533815E-01,  1.15467880464567E+00)
-X( 2) = ( -9.83138240997047E-01,  6.90556709892261E-01)
-X( 3) = (  1.57747266675851E+00, -1.42706632562327E+00)
-X( 4) = ( -9.80825996953318E-01, -2.88738473122372E-02)
-
-X( 5) = ( -5.20087864964849E-01,  1.09676594427363E-01)
-
-PATH NUMBER =      5612
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.49215700906381E-01,  1.09886953928807E+00)
-X( 2) = ( -1.32233411613580E+00,  4.70399584098564E-01)
-X( 3) = (  1.65115599257890E+00, -1.09392478417387E+00)
-X( 4) = ( -1.06870454050429E+00, -3.63644658362776E-02)
-
-X( 5) = ( -6.20359753930902E-01,  2.42963418739164E-01)
-
-PATH NUMBER =      5613
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.36470450935786E-02,  8.45132137892068E-01)
-X( 2) = ( -1.44065895877032E+00,  8.37185354752882E-02)
-X( 3) = (  1.49346143975859E+00, -7.91360828696632E-01)
-X( 4) = ( -1.13120853368477E+00, -9.85898514840084E-02)
-
-X( 5) = ( -9.00680373916690E-01,  3.62215927702536E-01)
-
-PATH NUMBER =      5614
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.16111319289627E-02,  5.12193150547961E-01)
-X( 2) = ( -1.28274725999779E+00, -2.88554075845574E-01)
-X( 3) = (  1.17817604214195E+00, -6.60947496583148E-01)
-X( 4) = ( -1.13909166343108E+00, -1.86434054752727E-01)
-
-X( 5) = ( -1.38346304878386E+00, -4.70950929316004E-02)
-
-PATH NUMBER =      5615
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.44060587808911E-01,  2.55838429638736E-01)
-X( 2) = ( -9.22487658666908E-01, -4.72227757677775E-01)
-X( 3) = (  8.52825341280671E-01, -7.63706635312059E-01)
-X( 4) = ( -1.08866532572372E+00, -2.58793796653429E-01)
-
-X( 5) = ( -9.07927088959243E-01, -5.49917882626771E-01)
-
-PATH NUMBER =      5616
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71587951214497E-01,  1.96019198143185E-01)
-X( 2) = ( -5.28449626079882E-01, -3.81359552986434E-01)
-X( 3) = (  6.69644545978030E-01, -1.05155610183149E+00)
-X( 4) = ( -1.00352456440227E+00, -2.81811149761822E-01)
-
-X( 5) = ( -5.87800492042872E-01, -3.97211815075372E-01)
-
-PATH NUMBER =      5617
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.71643976646113E-01,  4.31880819706829E-01)
-X( 2) = ( -2.45620403367051E-01,  6.94646168820329E-02)
-X( 3) = (  8.58721066294174E-01, -1.20459897681938E+00)
-X( 4) = ( -6.88982931299153E-01, -5.02943211228190E-01)
-
-X( 5) = ( -7.71668799386868E-01, -1.24249794463134E-01)
-
-PATH NUMBER =      5618
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.87428949393599E-01,  7.44044805973658E-01)
-X( 2) = ( -2.66684129559185E-01,  4.73295424507930E-01)
-X( 3) = (  1.11038844133506E+00, -1.43498137953986E+00)
-X( 4) = ( -6.51530725455543E-01, -4.23092850803449E-01)
-
-X( 5) = ( -6.13908872162970E-01,  3.81899913743965E-02)
-
-PATH NUMBER =      5619
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.75470241800815E-01,  1.05760143886521E+00)
-X( 2) = ( -5.42397319511683E-01,  7.69108268439864E-01)
-X( 3) = (  1.45126378945801E+00, -1.44969586849767E+00)
-X( 4) = ( -6.74167493596525E-01, -3.37850112047325E-01)
-
-X( 5) = ( -5.29101410495491E-01,  1.75644161601036E-01)
-
-PATH NUMBER =      5620
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.88154577432860E-01,  1.22583408505772E+00)
-X( 2) = ( -9.43750707434988E-01,  8.18489031408526E-01)
-X( 3) = (  1.72184774686879E+00, -1.24185737077612E+00)
-X( 4) = ( -7.46301240329280E-01, -2.87101019791324E-01)
-
-X( 5) = ( -4.73940191033871E-01,  3.14427450872326E-01)
-
-PATH NUMBER =      5621
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.00798511945726E-02,  1.17002481970011E+00)
-X( 2) = ( -1.28294658257373E+00,  5.98331905614829E-01)
-X( 3) = (  1.79553107268918E+00, -9.08715829326725E-01)
-X( 4) = ( -8.34179783880255E-01, -2.94591638315364E-01)
-
-X( 5) = ( -4.39749137867642E-01,  4.86806166337975E-01)
-
-PATH NUMBER =      5622
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.55648507007375E-01,  9.16287418304116E-01)
-X( 2) = ( -1.40127142520826E+00,  2.11650856991554E-01)
-X( 3) = (  1.63783651986887E+00, -6.06151873849485E-01)
-X( 4) = ( -8.96683777060728E-01, -3.56817023963095E-01)
-
-X( 5) = ( -4.55342223242993E-01,  7.60151820761222E-01)
-
-PATH NUMBER =      5623
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.57684420171991E-01,  5.83348430960009E-01)
-X( 2) = ( -1.24335972643573E+00, -1.60621754329308E-01)
-X( 3) = (  1.32255112225222E+00, -4.75738541736000E-01)
-X( 4) = ( -9.04566906807047E-01, -4.44661227231814E-01)
-
-X( 5) = ( -8.00328864376646E-01,  1.29272643666064E+00)
-
-PATH NUMBER =      5624
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.52349642920427E-02,  3.26993710050783E-01)
-X( 2) = ( -8.83100125104848E-01, -3.44295436161510E-01)
-X( 3) = (  9.97200421390944E-01, -5.78497680464911E-01)
-X( 4) = ( -8.54140569099683E-01, -5.17020969132516E-01)
-
-X( 5) = ( -2.21563497469253E+00,  4.93259979395351E-01)
-
-PATH NUMBER =      5625
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.82292399113543E-01,  2.67174478555232E-01)
-X( 2) = ( -4.89062092517822E-01, -2.53427231470168E-01)
-X( 3) = (  8.14019626088304E-01, -8.66347146984345E-01)
-X( 4) = ( -7.68999807778228E-01, -5.40038322240909E-01)
-
-X( 5) = ( -1.18283084453379E+00, -3.06761572585084E-01)
-
-PATH NUMBER =      5626
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.04292993927506E-01,  3.00433330437130E-01)
-X( 2) = ( -2.97681113302763E-01,  1.92784279424684E-01)
-X( 3) = (  8.50268772758766E-01, -9.69918173500466E-01)
-X( 4) = ( -3.43341317759533E-01, -5.50007094045438E-01)
-
-X( 5) = ( -1.66656339940274E+00,  6.34839461048149E-03)
-
-PATH NUMBER =      5627
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.20077966674991E-01,  6.12597316703959E-01)
-X( 2) = ( -3.18744839494896E-01,  5.96615087050581E-01)
-X( 3) = (  1.10193614779965E+00, -1.20030057622095E+00)
-X( 4) = ( -3.05889111915922E-01, -4.70156733620696E-01)
-
-X( 5) = ( -9.45637624663570E-01,  3.02177370981324E-01)
-
-PATH NUMBER =      5628
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.08119259082207E-01,  9.26153949595509E-01)
-X( 2) = ( -5.94458029447395E-01,  8.92427930982514E-01)
-X( 3) = (  1.44281149592260E+00, -1.21501506517875E+00)
-X( 4) = ( -3.28525880056904E-01, -3.84913994864572E-01)
-
-X( 5) = ( -6.20745878653743E-01,  4.60394164011479E-01)
-
-PATH NUMBER =      5629
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.08035947142537E-02,  1.09438659578802E+00)
-X( 2) = ( -9.95811417370699E-01,  9.41808693951178E-01)
-X( 3) = (  1.71339545333338E+00, -1.00717656745720E+00)
-X( 4) = ( -4.00659626789659E-01, -3.34164902608571E-01)
-
-X( 5) = ( -3.95049952561793E-01,  5.80102776641955E-01)
-
-PATH NUMBER =      5630
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.07430833913180E-01,  1.03857733043042E+00)
-X( 2) = ( -1.33500729250945E+00,  7.21651568157481E-01)
-X( 3) = (  1.78707877915377E+00, -6.74035026007809E-01)
-X( 4) = ( -4.88538170340635E-01, -3.41655521132612E-01)
-
-X( 5) = ( -1.87234688034388E-01,  6.97798083140320E-01)
-
-PATH NUMBER =      5631
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.22999489725982E-01,  7.84839929034417E-01)
-X( 2) = ( -1.45333213514397E+00,  3.34970519534205E-01)
-X( 3) = (  1.62938422633346E+00, -3.71471070530568E-01)
-X( 4) = ( -5.51042163521107E-01, -4.03880906780342E-01)
-
-X( 5) = (  6.00731249164479E-02,  8.47669261633960E-01)
-
-PATH NUMBER =      5632
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.25035402890599E-01,  4.51900941690311E-01)
-X( 2) = ( -1.29542043637144E+00, -3.73020917866572E-02)
-X( 3) = (  1.31409882871681E+00, -2.41057738417084E-01)
-X( 4) = ( -5.58925293267426E-01, -4.91725110049061E-01)
-
-X( 5) = (  4.62307846156556E-01,  1.11584002939824E+00)
-
-PATH NUMBER =      5633
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.12585947010651E-01,  1.95546220781085E-01)
-X( 2) = ( -9.35160835040559E-01, -2.20975773618859E-01)
-X( 3) = (  9.88748127855536E-01, -3.43816877145995E-01)
-X( 4) = ( -5.08498955560062E-01, -5.64084851949763E-01)
-
-X( 5) = (  1.60557052227463E+00,  2.07612412156810E+00)
-
-PATH NUMBER =      5634
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.49414163949353E-02,  1.35726989285534E-01)
-X( 2) = ( -5.41122802453534E-01, -1.30107568927517E-01)
-X( 3) = (  8.05567332552896E-01, -6.31666343665428E-01)
-X( 4) = ( -4.23358194238607E-01, -5.87102205058156E-01)
-
-X( 5) = ( -7.74992820211696E+00,  1.38134711518362E-02)
-
-PATH NUMBER =      5635
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.83983076680484E-01,  2.78888125910953E-02)
-X( 2) = ( -4.16830281966984E-01,  2.53788642344629E-01)
-X( 3) = (  6.92944027659673E-01, -7.95575277769306E-01)
-X( 4) = ( -4.83123996581629E-02, -3.63885973373862E-01)
-
-X( 5) = (  5.53161412621156E-01, -3.67031738481486E+00)
-
-PATH NUMBER =      5636
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.99768049427969E-01,  3.40052798857924E-01)
-X( 2) = ( -4.37894008159119E-01,  6.57619449970526E-01)
-X( 3) = (  9.44611402700557E-01, -1.02595768048979E+00)
-X( 4) = ( -1.08601938145523E-02, -2.84035612949120E-01)
-
-X( 5) = ( -3.08799686941915E+00,  3.66692850233717E-01)
-
-PATH NUMBER =      5637
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.87809341835186E-01,  6.53609431749475E-01)
-X( 2) = ( -7.13607198111617E-01,  9.53432293902460E-01)
-X( 3) = (  1.28548675082350E+00, -1.04067216944759E+00)
-X( 4) = ( -3.34969619555347E-02, -1.98792874192996E-01)
-
-X( 5) = ( -9.70094128273438E-01,  1.22051395001970E+00)
-
-PATH NUMBER =      5638
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.95063225327680E-02,  8.21842077941985E-01)
-X( 2) = ( -1.11496058603492E+00,  1.00281305687112E+00)
-X( 3) = (  1.55607070823428E+00, -8.32833671726040E-01)
-X( 4) = ( -1.05630708688290E-01, -1.48043781936995E-01)
-
-X( 5) = ( -1.89828810060814E-01,  1.06633735197069E+00)
-
-PATH NUMBER =      5639
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.27740751160201E-01,  7.66032812584382E-01)
-X( 2) = ( -1.45415646117367E+00,  7.82655931077426E-01)
-X( 3) = (  1.62975403405467E+00, -4.99692130276649E-01)
-X( 4) = ( -1.93509252239265E-01, -1.55534400461035E-01)
-
-X( 5) = (  2.30689792117679E-01,  8.75414254750731E-01)
-
-PATH NUMBER =      5640
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.43309406973004E-01,  5.12295411188382E-01)
-X( 2) = ( -1.57248130380820E+00,  3.95974882454150E-01)
-X( 3) = (  1.47205948123437E+00, -1.97128174799408E-01)
-X( 4) = ( -2.56013245419737E-01, -2.17759786108766E-01)
-
-X( 5) = (  5.38820043719119E-01,  6.74205209386926E-01)
-
-PATH NUMBER =      5641
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.45345320137620E-01,  1.79356423844275E-01)
-X( 2) = ( -1.41456960503566E+00,  2.37022711332869E-02)
-X( 3) = (  1.15677408361772E+00, -6.67148426859235E-02)
-X( 4) = ( -2.63896375166057E-01, -3.05603989377485E-01)
-
-X( 5) = (  8.23495692587278E-01,  4.26939838152798E-01)
-
-PATH NUMBER =      5642
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.32895864257672E-01, -7.69982970649501E-02)
-X( 2) = ( -1.05431000370478E+00, -1.59971410698914E-01)
-X( 3) = (  8.31423382756443E-01, -1.69473981414835E-01)
-X( 4) = ( -2.13470037458692E-01, -3.77963731278187E-01)
-
-X( 5) = (  1.14351548970938E+00,  4.28387556303955E-02)
-
-PATH NUMBER =      5643
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.05368500852086E-01, -1.36817528560501E-01)
-X( 2) = ( -6.60271971117756E-01, -6.91032060075723E-02)
-X( 3) = (  6.48242587453803E-01, -4.57323447934269E-01)
-X( 4) = ( -1.28329276137237E-01, -4.00981084386580E-01)
-
-X( 5) = (  1.53340162570427E+00, -8.05362671198941E-01)
-
-PATH NUMBER =      5644
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.67008572280723E-01, -2.58226124936199E-01)
-X( 2) = ( -5.47316689146219E-01,  2.23933086243652E-01)
-X( 3) = (  4.60360827698541E-01, -7.63147268143970E-01)
-X( 4) = (  5.80565133441330E-02, -3.16679900815392E-02)
-
-X( 5) = (  3.93652987751430E-01, -9.72164038015126E-01)
-
-PATH NUMBER =      5645
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.82793545028208E-01,  5.39378613306303E-02)
-X( 2) = ( -5.68380415338353E-01,  6.27763893869549E-01)
-X( 3) = (  7.12028202739425E-01, -9.93529670864450E-01)
-X( 4) = (  9.55087191877435E-02,  4.81823703432025E-02)
-
-X( 5) = ( -4.87628307889225E-03, -1.72588569376409E+00)
-
-PATH NUMBER =      5646
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.70834837435424E-01,  3.67494494222181E-01)
-X( 2) = ( -8.44093605290852E-01,  9.23576737801483E-01)
-X( 3) = (  1.05290355086237E+00, -1.00824415982226E+00)
-X( 4) = (  7.28719510467613E-02,  1.33425109099326E-01)
-
-X( 5) = ( -4.09054439675043E+00, -5.78962672367302E+00)
-
-PATH NUMBER =      5647
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.64808269325293E-02,  5.35727140414691E-01)
-X( 2) = ( -1.24544699321416E+00,  9.72957500770145E-01)
-X( 3) = (  1.32348750827315E+00, -8.00405662100704E-01)
-X( 4) = (  7.38204314006245E-04,  1.84174201355327E-01)
-
-X( 5) = (  1.42535711765512E+00,  2.66691186876951E+00)
-
-PATH NUMBER =      5648
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.44715255559963E-01,  4.79917875057087E-01)
-X( 2) = ( -1.58464286835290E+00,  7.52800374976449E-01)
-X( 3) = (  1.39717083409354E+00, -4.67264120651312E-01)
-X( 4) = ( -8.71403392369690E-02,  1.76683582831287E-01)
-
-X( 5) = (  1.06568788397027E+00,  8.01817027363839E-01)
-
-PATH NUMBER =      5649
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.60283911372765E-01,  2.26180473661088E-01)
-X( 2) = ( -1.70296771098743E+00,  3.66119326353174E-01)
-X( 3) = (  1.23947628127324E+00, -1.64700165174072E-01)
-X( 4) = ( -1.49644332417441E-01,  1.14458197183556E-01)
-
-X( 5) = (  8.92365409811432E-01,  2.46686417005994E-01)
-
-PATH NUMBER =      5650
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.62319824537381E-01, -1.06758513683019E-01)
-X( 2) = ( -1.54505601221490E+00, -6.15328496768947E-03)
-X( 3) = (  9.24190883656587E-01, -3.42868330605873E-02)
-X( 4) = ( -1.57527462163760E-01,  2.66139939148372E-02)
-
-X( 5) = (  7.77431433398196E-01, -7.38720739073173E-02)
-
-PATH NUMBER =      5651
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.49870368657433E-01, -3.63113234592244E-01)
-X( 2) = ( -1.18479641088402E+00, -1.89826966799890E-01)
-X( 3) = (  5.98840182795312E-01, -1.37045971789498E-01)
-X( 4) = ( -1.07101124456396E-01, -4.57457479858644E-02)
-
-X( 5) = (  6.76619135086487E-01, -3.32134357568330E-01)
-
-PATH NUMBER =      5652
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.23430052518474E-02, -4.22932466087795E-01)
-X( 2) = ( -7.90758378296990E-01, -9.89587621085488E-02)
-X( 3) = (  4.15659387492671E-01, -4.24895438308932E-01)
-X( 4) = ( -2.19603631349415E-02, -6.87631010942574E-02)
-
-X( 5) = (  5.63224881187049E-01, -6.01922980394105E-01)
-
-PATH NUMBER =      5653
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.14520928611268E-01, -4.24035123062399E-01)
-X( 2) = ( -6.28084294726423E-01,  1.17187357628948E-01)
-X( 3) = (  2.61347437011524E-01, -8.87807570725335E-01)
-X( 4) = ( -7.40057753052070E-02,  2.91198369257440E-01)
-
-X( 5) = (  8.24864176180675E-02, -6.29877070483603E-01)
-
-PATH NUMBER =      5654
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.30305901358753E-01, -1.11871136795570E-01)
-X( 2) = ( -6.49148020918557E-01,  5.21018165254845E-01)
-X( 3) = (  5.13014812052408E-01, -1.11818997344581E+00)
-X( 4) = ( -3.65535694615963E-02,  3.71048729682181E-01)
-
-X( 5) = ( -9.67500730714999E-02, -7.83908709697080E-01)
-
-PATH NUMBER =      5655
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.18347193765969E-01,  2.01685496095981E-01)
-X( 2) = ( -9.24861210871056E-01,  8.16831009186779E-01)
-X( 3) = (  8.53890160175356E-01, -1.13290446240362E+00)
-X( 4) = ( -5.91903376025788E-02,  4.56291468438305E-01)
-
-X( 5) = ( -3.43877688016162E-01, -1.16018862195560E+00)
-
-PATH NUMBER =      5656
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.31031529398016E-01,  3.69918142288491E-01)
-X( 2) = ( -1.32621459879436E+00,  8.66211772155441E-01)
-X( 3) = (  1.12447411758613E+00, -9.25065964682069E-01)
-X( 4) = ( -1.31324084335334E-01,  5.07040560694306E-01)
-
-X( 5) = (  1.63902499623820E-02, -2.59422814485524E+00)
-
-PATH NUMBER =      5657
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.72028992294178E-02,  3.14108876930888E-01)
-X( 2) = ( -1.66541047393311E+00,  6.46054646361745E-01)
-X( 3) = (  1.19815744340653E+00, -5.91924423232677E-01)
-X( 4) = ( -2.19202627886309E-01,  4.99549942170266E-01)
-
-X( 5) = (  1.78373646840413E+00, -9.05605961807563E-01)
-
-PATH NUMBER =      5658
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.12771555042221E-01,  6.03714755348882E-02)
-X( 2) = ( -1.78373531656763E+00,  2.59373597738469E-01)
-X( 3) = (  1.04046289058622E+00, -2.89360467755436E-01)
-X( 4) = ( -2.81706621066781E-01,  4.37324556522535E-01)
-
-X( 5) = (  9.44842878207393E-01, -4.14419008753331E-01)
-
-PATH NUMBER =      5659
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.14807468206836E-01, -2.72567511809219E-01)
-X( 2) = ( -1.62582361779510E+00, -1.12899013582394E-01)
-X( 3) = (  7.25177492969569E-01, -1.58947135641952E-01)
-X( 4) = ( -2.89589750813101E-01,  3.49480353253816E-01)
-
-X( 5) = (  5.91864488111054E-01, -4.21328744318802E-01)
-
-PATH NUMBER =      5660
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.02358012326888E-01, -5.28922232718444E-01)
-X( 2) = ( -1.26556401646422E+00, -2.96572695414595E-01)
-X( 3) = (  3.99826792108295E-01, -2.61706274370863E-01)
-X( 4) = ( -2.39163413105736E-01,  2.77120611353114E-01)
-
-X( 5) = (  3.88818168028645E-01, -4.72839034803962E-01)
-
-PATH NUMBER =      5661
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.25169351078698E-01, -5.88741464213995E-01)
-X( 2) = ( -8.71525983877195E-01, -2.05704490723253E-01)
-X( 3) = (  2.16645996805654E-01, -5.49555740890297E-01)
-X( 4) = ( -1.54022651784282E-01,  2.54103258244721E-01)
-
-X( 5) = (  2.32990906072725E-01, -5.39150838440211E-01)
-
-PATH NUMBER =      5662
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.10706363351626E-01, -3.91954308802505E-01)
-X( 2) = ( -6.21341038424670E-01, -1.65010307340378E-02)
-X( 3) = (  1.89024432888545E-01, -1.11122624449064E+00)
-X( 4) = ( -3.82705853038305E-01,  4.53640346848476E-01)
-
-X( 5) = ( -8.61181457616678E-02, -4.89673133813745E-01)
-
-PATH NUMBER =      5663
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.26491336099111E-01, -7.97903225356757E-02)
-X( 2) = ( -6.42404764616804E-01,  3.87329776891859E-01)
-X( 3) = (  4.40691807929429E-01, -1.34160864721112E+00)
-X( 4) = ( -3.45253647194695E-01,  5.33490707273218E-01)
-
-X( 5) = ( -2.13726106692246E-01, -5.06214450688722E-01)
-
-PATH NUMBER =      5664
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.14532628506327E-01,  2.33766310355875E-01)
-X( 2) = ( -9.18117954569303E-01,  6.83142620823793E-01)
-X( 3) = (  7.81567156052376E-01, -1.35632313616893E+00)
-X( 4) = ( -3.67890415335678E-01,  6.18733446029341E-01)
-
-X( 5) = ( -3.76811257276221E-01, -5.80024005179850E-01)
-
-PATH NUMBER =      5665
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.27216964138373E-01,  4.01998956548385E-01)
-X( 2) = ( -1.31947134249261E+00,  7.32523383792455E-01)
-X( 3) = (  1.05215111346316E+00, -1.14848463844737E+00)
-X( 4) = ( -4.40024162068433E-01,  6.69482538285342E-01)
-
-X( 5) = ( -5.78249261353190E-01, -8.46361176596972E-01)
-
-PATH NUMBER =      5666
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.98982535510940E-01,  3.46189691190781E-01)
-X( 2) = ( -1.65866721763135E+00,  5.12366257998759E-01)
-X( 3) = (  1.12583443928355E+00, -8.15343096997982E-01)
-X( 4) = ( -5.27902705619407E-01,  6.61991919761302E-01)
-
-X( 5) = ( -2.49397653639412E-01, -1.50581105852017E+00)
-
-PATH NUMBER =      5667
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.65861203018628E-02,  9.24522897947819E-02)
-X( 2) = ( -1.77699206026588E+00,  1.25685209375484E-01)
-X( 3) = (  9.68139886463239E-01, -5.12779141520742E-01)
-X( 4) = ( -5.90406698799880E-01,  5.99766534113572E-01)
-
-X( 5) = (  4.36426947545931E-01, -1.05496016825781E+00)
-
-PATH NUMBER =      5668
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.86220334664785E-02, -2.40486697549325E-01)
-X( 2) = ( -1.61908036149335E+00, -2.46587401945379E-01)
-X( 3) = (  6.52854488846590E-01, -3.82365809407258E-01)
-X( 4) = ( -5.98289828546199E-01,  5.11922330844853E-01)
-
-X( 5) = (  3.14547672105309E-01, -6.74019955696045E-01)
-
-PATH NUMBER =      5669
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.93827422413469E-01, -4.96841418458551E-01)
-X( 2) = ( -1.25882076016247E+00, -4.30261083777580E-01)
-X( 3) = (  3.27503787985315E-01, -4.85124948136168E-01)
-X( 4) = ( -5.47863490838835E-01,  4.39562588944151E-01)
-
-X( 5) = (  1.58236555341900E-01, -5.48996244951249E-01)
-
-PATH NUMBER =      5670
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.21354785819055E-01, -5.56660649954102E-01)
-X( 2) = ( -8.64782727575441E-01, -3.39392879086239E-01)
-X( 3) = (  1.44322992682675E-01, -7.72974414655602E-01)
-X( 4) = ( -4.62722729517380E-01,  4.16545235835758E-01)
-
-X( 5) = (  3.10640510017343E-02, -5.02374454786548E-01)
-
-PATH NUMBER =      5671
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04193960472018E+00, -1.17309793740996E-01)
-X( 2) = ( -4.41157020268777E-01, -3.99672615361797E-01)
-X( 3) = (  6.09946365813763E-01, -9.18364562699609E-01)
-X( 4) = ( -8.55756821941850E-01,  1.53192225395367E-01)
-
-X( 5) = ( -3.45284917351435E-01, -2.69851146387294E-01)
-
-PATH NUMBER =      5672
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15772457746767E+00,  1.94854192525833E-01)
-X( 2) = ( -4.62220746460911E-01,  4.15819226409941E-03)
-X( 3) = (  8.61613740854646E-01, -1.14874696542009E+00)
-X( 4) = ( -8.18304616098239E-01,  2.33042585820108E-01)
-
-X( 5) = ( -3.67759960231433E-01, -1.87650647944411E-01)
-
-PATH NUMBER =      5673
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04576586987488E+00,  5.08410825417384E-01)
-X( 2) = ( -7.37933936413410E-01,  2.99971036196034E-01)
-X( 3) = (  1.20248908897759E+00, -1.16346145437790E+00)
-X( 4) = ( -8.40941384239222E-01,  3.18285324576232E-01)
-
-X( 5) = ( -4.13498154282140E-01, -1.17670237709219E-01)
-
-PATH NUMBER =      5674
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.58450205506928E-01,  6.76643471609894E-01)
-X( 2) = ( -1.13928732433671E+00,  3.49351799164696E-01)
-X( 3) = (  1.47307304638837E+00, -9.55622956656343E-01)
-X( 4) = ( -9.13075130971977E-01,  3.69034416832233E-01)
-
-X( 5) = ( -4.93500492527103E-01, -5.67011066360911E-02)
-
-PATH NUMBER =      5675
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.30215776879494E-01,  6.20834206252291E-01)
-X( 2) = ( -1.47848319947546E+00,  1.29194673371000E-01)
-X( 3) = (  1.54675637220877E+00, -6.22481415206951E-01)
-X( 4) = ( -1.00095367452295E+00,  3.61543798308192E-01)
-
-X( 5) = ( -6.41087477962048E-01, -2.90866728064697E-02)
-
-PATH NUMBER =      5676
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.14647121066692E-01,  3.67096804856291E-01)
-X( 2) = ( -1.59680804210999E+00, -2.57486375252276E-01)
-X( 3) = (  1.38906181938846E+00, -3.19917459729710E-01)
-X( 4) = ( -1.06345766770342E+00,  2.99318412660462E-01)
-
-X( 5) = ( -8.59306721243575E-01, -1.80106672084037E-01)
-
-PATH NUMBER =      5677
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.12611207902076E-01,  3.41578175121840E-02)
-X( 2) = ( -1.43889634333745E+00, -6.29758986573139E-01)
-X( 3) = (  1.07377642177181E+00, -1.89504127616226E-01)
-X( 4) = ( -1.07134079744974E+00,  2.11474209391743E-01)
-
-X( 5) = ( -7.40913081651810E-01, -5.40370945049180E-01)
-
-PATH NUMBER =      5678
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.25060663782024E-01, -2.22196903397042E-01)
-X( 2) = ( -1.07863674200657E+00, -8.13432668405340E-01)
-X( 3) = (  7.48425720910533E-01, -2.92263266345137E-01)
-X( 4) = ( -1.02091445974238E+00,  1.39114467491042E-01)
-
-X( 5) = ( -4.47874263333757E-01, -5.13418278713638E-01)
-
-PATH NUMBER =      5679
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.52588027187610E-01, -2.82016134892593E-01)
-X( 2) = ( -6.84598709419548E-01, -7.22564463713999E-01)
-X( 3) = (  5.65244925607893E-01, -5.80112732864571E-01)
-X( 4) = ( -9.35773698420924E-01,  1.16097114382648E-01)
-
-X( 5) = ( -3.54696789212006E-01, -3.76147746107702E-01)
-
-PATH NUMBER =      5680
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06177823110824E+00,  1.79946693654901E-01)
-X( 2) = ( -3.08328704752861E-01, -4.16246549289744E-01)
-X( 3) = (  8.17412050036187E-01, -1.02838506343716E+00)
-X( 4) = ( -1.06933614683213E+00, -1.22610251126364E-01)
-
-X( 5) = ( -3.72376052808509E-01, -1.50672749907519E-01)
-
-PATH NUMBER =      5681
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.17756320385573E+00,  4.92110679921731E-01)
-X( 2) = ( -3.29392430944995E-01, -1.24157416638465E-02)
-X( 3) = (  1.06907942507707E+00, -1.25876746615764E+00)
-X( 4) = ( -1.03188394098852E+00, -4.27598907016221E-02)
-
-X( 5) = ( -3.55156555914806E-01, -8.38122606223014E-02)
-
-PATH NUMBER =      5682
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.06560449626294E+00,  8.05667312813282E-01)
-X( 2) = ( -6.05105620897495E-01,  2.83397102268087E-01)
-X( 3) = (  1.40995477320002E+00, -1.27348195511545E+00)
-X( 4) = ( -1.05452070912950E+00,  4.24828480545011E-02)
-
-X( 5) = ( -3.62735795759958E-01, -2.18165235263041E-02)
-
-PATH NUMBER =      5683
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.78288831894991E-01,  9.73899959005791E-01)
-X( 2) = ( -1.00645900882080E+00,  3.32777865236749E-01)
-X( 3) = (  1.68053873061080E+00, -1.06564345739389E+00)
-X( 4) = ( -1.12665445586226E+00,  9.32319403105021E-02)
-
-X( 5) = ( -3.94807087754470E-01,  3.80168305985676E-02)
-
-PATH NUMBER =      5684
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.50054403267557E-01,  9.18090693648187E-01)
-X( 2) = ( -1.34565488395954E+00,  1.12620739443053E-01)
-X( 3) = (  1.75422205643119E+00, -7.32501915944502E-01)
-X( 4) = ( -1.21453299941323E+00,  8.57413217864621E-02)
-
-X( 5) = ( -4.66403344915471E-01,  9.04706034991662E-02)
-
-PATH NUMBER =      5685
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.34485747454755E-01,  6.64353292252188E-01)
-X( 2) = ( -1.46397972659407E+00, -2.74060309180222E-01)
-X( 3) = (  1.59652750361088E+00, -4.29937960467262E-01)
-X( 4) = ( -1.27703699259370E+00,  2.35159361387313E-02)
-
-X( 5) = ( -6.02685395978010E-01,  8.82242141333334E-02)
-
-PATH NUMBER =      5686
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.32449834290139E-01,  3.31414304908082E-01)
-X( 2) = ( -1.30606802782154E+00, -6.46332920501085E-01)
-X( 3) = (  1.28124210599423E+00, -2.99524628353777E-01)
-X( 4) = ( -1.28492012234002E+00, -6.43282671299876E-02)
-
-X( 5) = ( -7.08329982081267E-01, -8.71609563620748E-02)
-
-PATH NUMBER =      5687
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.44899290170087E-01,  7.50595839988558E-02)
-X( 2) = ( -9.45808426490658E-01, -8.30006602333286E-01)
-X( 3) = (  9.55891405132958E-01, -4.02283767082688E-01)
-X( 4) = ( -1.23449378463266E+00, -1.36688009030690E-01)
-
-X( 5) = ( -5.72196114489414E-01, -2.46264022803247E-01)
-
-PATH NUMBER =      5688
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.72426653575673E-01,  1.52403525033047E-02)
-X( 2) = ( -5.51770393903633E-01, -7.39138397641945E-01)
-X( 3) = (  7.72710609830317E-01, -6.90133233602122E-01)
-X( 4) = ( -1.14935302331120E+00, -1.59705362139082E-01)
-
-X( 5) = ( -4.32256478682807E-01, -2.20237981839490E-01)
-
-PATH NUMBER =      5689
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.85902713614906E-01,  4.20410397241043E-01)
-X( 2) = ( -1.95922792390392E-01, -3.43562523846703E-01)
-X( 3) = (  1.04705979925826E+00, -9.79309285403014E-01)
-X( 4) = ( -1.05566498720040E+00, -4.71173349388977E-01)
-
-X( 5) = ( -4.13206122565237E-01, -4.22645093506669E-02)
-
-PATH NUMBER =      5690
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.00168768636239E+00,  7.32574383507872E-01)
-X( 2) = ( -2.16986518582526E-01,  6.02682837791941E-02)
-X( 3) = (  1.29872717429914E+00, -1.20969168812349E+00)
-X( 4) = ( -1.01821278135679E+00, -3.91322988964235E-01)
-
-X( 5) = ( -3.62870594514124E-01,  7.81847234550633E-03)
-
-PATH NUMBER =      5691
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.89728978769608E-01,  1.04613101639942E+00)
-X( 2) = ( -4.92699708535025E-01,  3.56081127711128E-01)
-X( 3) = (  1.63960252242209E+00, -1.22440617708130E+00)
-X( 4) = ( -1.04084954949777E+00, -3.06080250208111E-01)
-
-X( 5) = ( -3.41180888422743E-01,  6.30225441184528E-02)
-
-PATH NUMBER =      5692
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.02413314401654E-01,  1.21436366259193E+00)
-X( 2) = ( -8.94053096458329E-01,  4.05461890679790E-01)
-X( 3) = (  1.91018647983287E+00, -1.01656767935975E+00)
-X( 4) = ( -1.11298329623053E+00, -2.55331157952110E-01)
-
-X( 5) = ( -3.41257087872289E-01,  1.22259797472005E-01)
-
-PATH NUMBER =      5693
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.74178885774220E-01,  1.15855439723433E+00)
-X( 2) = ( -1.23324897159708E+00,  1.85304764886094E-01)
-X( 3) = (  1.98386980565326E+00, -6.83426137910356E-01)
-X( 4) = ( -1.20086183978150E+00, -2.62821776476151E-01)
-
-X( 5) = ( -3.69694988991098E-01,  1.87029726922982E-01)
-
-PATH NUMBER =      5694
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.86102299614176E-02,  9.04816995838330E-01)
-X( 2) = ( -1.35157381423160E+00, -2.01376283737182E-01)
-X( 3) = (  1.82617525283295E+00, -3.80862182433116E-01)
-X( 4) = ( -1.26336583296198E+00, -3.25047162123882E-01)
-
-X( 5) = ( -4.51806972362362E-01,  2.44546415993387E-01)
-
-PATH NUMBER =      5695
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.65743167968010E-02,  5.71878008494223E-01)
-X( 2) = ( -1.19366211545907E+00, -5.73648895058045E-01)
-X( 3) = (  1.51088985521631E+00, -2.50448850319631E-01)
-X( 4) = ( -1.27124896270829E+00, -4.12891365392601E-01)
-
-X( 5) = ( -6.02634361713399E-01,  2.11039709622106E-01)
-
-PATH NUMBER =      5696
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.69023772676750E-01,  3.15523287584997E-01)
-X( 2) = ( -8.33402514128190E-01, -7.57322576890246E-01)
-X( 3) = (  1.18553915435503E+00, -3.53207989048542E-01)
-X( 4) = ( -1.22082262500093E+00, -4.85251107293302E-01)
-
-X( 5) = ( -6.39468278561760E-01,  2.21672706445165E-02)
-
-PATH NUMBER =      5697
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.96551136082336E-01,  2.55704056089446E-01)
-X( 2) = ( -4.39364481541164E-01, -6.66454372198904E-01)
-X( 3) = (  1.00235835905239E+00, -6.41057455567976E-01)
-X( 4) = ( -1.13568186367948E+00, -5.08268460401695E-01)
-
-X( 5) = ( -5.11309201718889E-01, -6.56476753075917E-02)
-
-PATH NUMBER =      5698
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.96607161513953E-01,  4.91565677653090E-01)
-X( 2) = ( -1.56535258828332E-01, -2.15630202330437E-01)
-X( 3) = (  1.19143487936853E+00, -7.94100330555867E-01)
-X( 4) = ( -8.21140230576364E-01, -7.29400521868063E-01)
-
-X( 5) = ( -4.81667728435617E-01,  8.08207538470182E-02)
-
-PATH NUMBER =      5699
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.12392134261438E-01,  8.03729663919920E-01)
-X( 2) = ( -1.77598985020466E-01,  1.88200605295460E-01)
-X( 3) = (  1.44310225440942E+00, -1.02448273327635E+00)
-X( 4) = ( -7.83688024732753E-01, -6.49550161443322E-01)
-
-X( 5) = ( -3.91751602114013E-01,  1.05918261920295E-01)
-
-PATH NUMBER =      5700
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.00433426668655E-01,  1.11728629681147E+00)
-X( 2) = ( -4.53312174972965E-01,  4.84013449227394E-01)
-X( 3) = (  1.78397760253237E+00, -1.03919722223415E+00)
-X( 4) = ( -8.06324792873736E-01, -5.64307422687198E-01)
-
-X( 5) = ( -3.38149432254687E-01,  1.52306294629259E-01)
-
-PATH NUMBER =      5701
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.13117762300700E-01,  1.28551894300398E+00)
-X( 2) = ( -8.54665562896269E-01,  5.33394212196055E-01)
-X( 3) = (  2.05456155994314E+00, -8.31358724512600E-01)
-X( 4) = ( -8.78458539606490E-01, -5.13558330431197E-01)
-
-X( 5) = ( -3.07364566661982E-01,  2.09529320121042E-01)
-
-PATH NUMBER =      5702
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.51166663267333E-02,  1.22970967764638E+00)
-X( 2) = ( -1.19386143803502E+00,  3.13237086402359E-01)
-X( 3) = (  2.12824488576353E+00, -4.98217183063209E-01)
-X( 4) = ( -9.66337083157466E-01, -5.21048948955237E-01)
-
-X( 5) = ( -2.98250746078487E-01,  2.80708235247170E-01)
-
-PATH NUMBER =      5703
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.30685322139536E-01,  9.75972276250377E-01)
-X( 2) = ( -1.31218628066954E+00, -7.34439622209168E-02)
-X( 3) = (  1.97055033294323E+00, -1.95653227585968E-01)
-X( 4) = ( -1.02884107633794E+00, -5.83274334602968E-01)
-
-X( 5) = ( -3.28577067927034E-01,  3.71440710097911E-01)
-
-PATH NUMBER =      5704
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.32721235304152E-01,  6.43033288906270E-01)
-X( 2) = ( -1.15427458189701E+00, -4.45716573541779E-01)
-X( 3) = (  1.65526493532658E+00, -6.52398954724838E-02)
-X( 4) = ( -1.03672420608426E+00, -6.71118537871687E-01)
-
-X( 5) = ( -4.53958118287334E-01,  4.53582074779336E-01)
-
-PATH NUMBER =      5705
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.02717794242034E-02,  3.86678567997045E-01)
-X( 2) = ( -7.94014980566129E-01, -6.29390255373980E-01)
-X( 3) = (  1.32991423446530E+00, -1.67999034201395E-01)
-X( 4) = ( -9.86297868376893E-01, -7.43478279772389E-01)
-
-X( 5) = ( -6.53916257029980E-01,  3.51692419869815E-01)
-
-PATH NUMBER =      5706
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.07255583981383E-01,  3.26859336501493E-01)
-X( 2) = ( -3.99976947979104E-01, -5.38522050682638E-01)
-X( 3) = (  1.14673343916266E+00, -4.55848500720829E-01)
-X( 4) = ( -9.01157107055438E-01, -7.66495632880781E-01)
-
-X( 5) = ( -6.16704436576102E-01,  1.34139284431380E-01)
-
-PATH NUMBER =      5707
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.29256178795345E-01,  3.60118188383392E-01)
-X( 2) = ( -2.08595968764044E-01, -9.23105397877865E-02)
-X( 3) = (  1.18298258583312E+00, -5.59419527236950E-01)
-X( 4) = ( -4.75498617036743E-01, -7.76464404685311E-01)
-
-X( 5) = ( -6.35016266684933E-01,  2.54956937831442E-01)
-
-PATH NUMBER =      5708
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.45041151542830E-01,  6.72282174650221E-01)
-X( 2) = ( -2.29659694956178E-01,  3.11520267838110E-01)
-X( 3) = (  1.43464996087401E+00, -7.89801929957431E-01)
-X( 4) = ( -4.38046411193132E-01, -6.96614044260569E-01)
-
-X( 5) = ( -4.68255166903656E-01,  2.31670718819303E-01)
-
-PATH NUMBER =      5709
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.33082443950046E-01,  9.85838807541772E-01)
-X( 2) = ( -5.05372884908677E-01,  6.07333111770044E-01)
-X( 3) = (  1.77552530899696E+00, -8.04516418915237E-01)
-X( 4) = ( -4.60683179334115E-01, -6.11371305504446E-01)
-
-X( 5) = ( -3.62893332677289E-01,  2.65391663757101E-01)
-
-PATH NUMBER =      5710
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.57667795820933E-02,  1.15407145373428E+00)
-X( 2) = ( -9.06726272831980E-01,  6.56713874738707E-01)
-X( 3) = (  2.04610926640773E+00, -5.96677921193685E-01)
-X( 4) = ( -5.32816926066870E-01, -5.60622213248444E-01)
-
-X( 5) = ( -2.89305812519117E-01,  3.19340720594754E-01)
-
-PATH NUMBER =      5711
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.82467649045341E-01,  1.09826218837668E+00)
-X( 2) = ( -1.24592214797073E+00,  4.36556748945010E-01)
-X( 3) = (  2.11979259222813E+00, -2.63536379744293E-01)
-X( 4) = ( -6.20695469617845E-01, -5.68112831772485E-01)
-
-X( 5) = ( -2.33539023345200E-01,  3.93629876789634E-01)
-
-PATH NUMBER =      5712
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.98036304858143E-01,  8.44524786980679E-01)
-X( 2) = ( -1.36424699060525E+00,  4.98757003217348E-02)
-X( 3) = (  1.96209803940782E+00,  3.90275757329474E-02)
-X( 4) = ( -6.83199462798317E-01, -6.30338217420215E-01)
-
-X( 5) = ( -1.98065290328365E-01,  5.05074032259768E-01)
-
-PATH NUMBER =      5713
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.00072218022759E-01,  5.11585799636572E-01)
-X( 2) = ( -1.20633529183272E+00, -3.22396910999128E-01)
-X( 3) = (  1.64681264179117E+00,  1.69440907846433E-01)
-X( 4) = ( -6.91082592544636E-01, -7.18182420688934E-01)
-
-X( 5) = ( -2.30997236639816E-01,  6.87435014037018E-01)
-
-PATH NUMBER =      5714
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.87622762142811E-01,  2.55231078727347E-01)
-X( 2) = ( -8.46075690501841E-01, -5.06070592831329E-01)
-X( 3) = (  1.32146194092990E+00,  6.66817691175211E-02)
-X( 4) = ( -6.40656254837272E-01, -7.90542162589636E-01)
-
-X( 5) = ( -5.30867172322436E-01,  8.56248428258472E-01)
-
-PATH NUMBER =      5715
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.99046012627747E-02,  1.95411847231796E-01)
-X( 2) = ( -4.52037657914815E-01, -4.15202388139988E-01)
-X( 3) = (  1.13828114562726E+00, -2.21167697401912E-01)
-X( 4) = ( -5.55515493515817E-01, -8.13559515698029E-01)
-
-X( 5) = ( -8.21310027055099E-01,  5.03308983158417E-01)
-
-PATH NUMBER =      5716
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.08946261548324E-01,  8.75736705373572E-02)
-X( 2) = ( -3.27745137428266E-01, -3.13061768678415E-02)
-X( 3) = (  1.02565784073403E+00, -3.85076631505790E-01)
-X( 4) = ( -1.80469698935373E-01, -5.90343284013735E-01)
-
-X( 5) = ( -1.21622884776446E+00,  4.68503595049462E-01)
-
-PATH NUMBER =      5717
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.24731234295809E-01,  3.99737656804186E-01)
-X( 2) = ( -3.48808863620400E-01,  3.72524630758055E-01)
-X( 3) = (  1.27732521577492E+00, -6.15459034226271E-01)
-X( 4) = ( -1.43017493091763E-01, -5.10492923588993E-01)
-
-X( 5) = ( -7.20260152109863E-01,  3.88524634515491E-01)
-
-PATH NUMBER =      5718
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.12772526703025E-01,  7.13294289695736E-01)
-X( 2) = ( -6.24522053572898E-01,  6.68337474689989E-01)
-X( 3) = (  1.61820056389786E+00, -6.30173523184077E-01)
-X( 4) = ( -1.65654261232745E-01, -4.25250184832869E-01)
-
-X( 5) = ( -4.76351798339218E-01,  4.30623938671013E-01)
-
-PATH NUMBER =      5719
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.45431376649283E-02,  8.81526935888247E-01)
-X( 2) = ( -1.02587544149620E+00,  7.17718237658652E-01)
-X( 3) = (  1.88878452130864E+00, -4.22335025462525E-01)
-X( 4) = ( -2.37788007965500E-01, -3.74501092576868E-01)
-
-X( 5) = ( -3.11318074247763E-01,  4.92168369843491E-01)
-
-PATH NUMBER =      5720
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.02777566292362E-01,  8.25717670530643E-01)
-X( 2) = ( -1.36507131663495E+00,  4.97561111864955E-01)
-X( 3) = (  1.96246784712903E+00, -8.91934840131327E-02)
-X( 4) = ( -3.25666551516475E-01, -3.81991711100908E-01)
-
-X( 5) = ( -1.68403545755578E-01,  5.71347995883629E-01)
-
-PATH NUMBER =      5721
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.18346222105164E-01,  5.71980269134644E-01)
-X( 2) = ( -1.48339615926948E+00,  1.10880063241680E-01)
-X( 3) = (  1.80477329430873E+00,  2.13370471464107E-01)
-X( 4) = ( -3.88170544696947E-01, -4.44217096748639E-01)
-
-X( 5) = ( -1.56301713031303E-02,  6.90576363816287E-01)
-
-PATH NUMBER =      5722
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.20382135269781E-01,  2.39041281790537E-01)
-X( 2) = ( -1.32548446049694E+00, -2.61392548079184E-01)
-X( 3) = (  1.48948789669208E+00,  3.43783803577593E-01)
-X( 4) = ( -3.96053674443267E-01, -5.32061300017358E-01)
-
-X( 5) = (  1.79642254110902E-01,  9.28252001547231E-01)
-
-PATH NUMBER =      5723
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.07932679389832E-01, -1.73134391186884E-02)
-X( 2) = ( -9.65224859166063E-01, -4.45066229911384E-01)
-X( 3) = (  1.16413719583080E+00,  2.41024664848681E-01)
-X( 4) = ( -3.45627336735902E-01, -6.04421041918060E-01)
-
-X( 5) = (  3.40291694805476E-01,  1.67003496360349E+00)
-
-PATH NUMBER =      5724
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -8.04053159842467E-02, -7.71326706142395E-02)
-X( 2) = ( -5.71186826579037E-01, -3.54198025220043E-01)
-X( 3) = (  9.80956400528162E-01, -4.68248016707524E-02)
-X( 4) = ( -2.60486575414448E-01, -6.27438395026453E-01)
-
-X( 5) = ( -1.81532194012580E+00,  2.02848925577453E+00)
-
-PATH NUMBER =      5725
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.91971757148562E-01, -1.98541266989937E-01)
-X( 2) = ( -4.58231544607500E-01, -6.11617329688180E-02)
-X( 3) = (  7.93074640772900E-01, -3.52648621880454E-01)
-X( 4) = ( -7.41007859330773E-02, -2.58125300721412E-01)
-
-X( 5) = ( -1.44687999022403E+00, -1.24071582000627E+00)
-
-PATH NUMBER =      5726
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.07756729896047E-01,  1.13622719276892E-01)
-X( 2) = ( -4.79295270799634E-01,  3.42669074657079E-01)
-X( 3) = (  1.04474201581378E+00, -5.83031024600934E-01)
-X( 4) = ( -3.66485800894667E-02, -1.78274940296670E-01)
-
-X( 5) = ( -1.31650521147023E+00, -6.46355945162041E-02)
-
-PATH NUMBER =      5727
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.95798022303264E-01,  4.27179352168442E-01)
-X( 2) = ( -7.55008460752133E-01,  6.38481918589013E-01)
-X( 3) = (  1.38561736393673E+00, -5.97745513558741E-01)
-X( 4) = ( -5.92853482304490E-02, -9.30322015405467E-02)
-
-X( 5) = ( -9.47672326352526E-01,  4.83150812888124E-01)
-
-PATH NUMBER =      5728
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.48235793530995E-03,  5.95411998360953E-01)
-X( 2) = ( -1.15636184867544E+00,  6.87862681557675E-01)
-X( 3) = (  1.65620132134751E+00, -3.89907015837188E-01)
-X( 4) = ( -1.31419094963204E-01, -4.22831092845459E-02)
-
-X( 5) = ( -5.68620556047644E-01,  7.89926739890407E-01)
-
-PATH NUMBER =      5729
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.19752070692124E-01,  5.39602733003349E-01)
-X( 2) = ( -1.49555772381418E+00,  4.67705555763979E-01)
-X( 3) = (  1.72988464716790E+00, -5.67654743877969E-02)
-X( 4) = ( -2.19297638514179E-01, -4.97737278085860E-02)
-
-X( 5) = ( -1.55286866662071E-01,  9.82487216303627E-01)
-
-PATH NUMBER =      5730
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.35320726504926E-01,  2.85865331607350E-01)
-X( 2) = ( -1.61388256644871E+00,  8.10245071407028E-02)
-X( 3) = (  1.57219009434759E+00,  2.45798481089444E-01)
-X( 4) = ( -2.81801631694652E-01, -1.11999113456317E-01)
-
-X( 5) = (  3.70007631375063E-01,  1.07780143613063E+00)
-
-PATH NUMBER =      5731
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.37356639669542E-01, -4.70736557367571E-02)
-X( 2) = ( -1.45597086767618E+00, -2.91248104180160E-01)
-X( 3) = (  1.25690469673095E+00,  3.76211813202928E-01)
-X( 4) = ( -2.89684761440971E-01, -1.99843316725036E-01)
-
-X( 5) = (  1.16210469639687E+00,  9.43466628178530E-01)
-
-PATH NUMBER =      5732
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.24907183789594E-01, -3.03428376645982E-01)
-X( 2) = ( -1.09571126634530E+00, -4.74921786012360E-01)
-X( 3) = (  9.31553995869671E-01,  2.73452674474017E-01)
-X( 4) = ( -2.39258423733607E-01, -2.72203058625737E-01)
-
-X( 5) = (  2.27801876490050E+00, -2.22166220087692E-01)
-
-PATH NUMBER =      5733
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.62017961599177E-03, -3.63247608141534E-01)
-X( 2) = ( -7.01673233758272E-01, -3.84053581321019E-01)
-X( 3) = (  7.48373200567031E-01, -1.43967920454162E-02)
-X( 4) = ( -1.54117662412152E-01, -2.95220411734130E-01)
-
-X( 5) = (  5.89578865326591E-01, -2.78571836926935E+00)
-
-PATH NUMBER =      5734
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.39484113479107E-01, -3.64350265116137E-01)
-X( 2) = ( -5.38999150187705E-01, -1.67907461583523E-01)
-X( 3) = (  5.94061250085883E-01, -4.77308924461819E-01)
-X( 4) = ( -2.06163074582417E-01,  6.47410586175668E-02)
-
-X( 5) = ( -4.11111941561282E-01, -7.59033506695243E-01)
-
-PATH NUMBER =      5735
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.55269086226592E-01, -5.21862788493080E-02)
-X( 2) = ( -5.60062876379839E-01,  2.35923346042374E-01)
-X( 3) = (  8.45728625126767E-01, -7.07691327182299E-01)
-X( 4) = ( -1.68710868738807E-01,  1.44591419042308E-01)
-
-X( 5) = ( -6.79730646816067E-01, -5.32857347318381E-01)
-
-PATH NUMBER =      5736
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.43310378633809E-01,  2.61370354042243E-01)
-X( 2) = ( -8.35776066332338E-01,  5.31736189974309E-01)
-X( 3) = (  1.18660397324972E+00, -7.22405816140106E-01)
-X( 4) = ( -1.91347636879789E-01,  2.29834157798432E-01)
-
-X( 5) = ( -9.48681274539928E-01, -2.39444595171212E-01)
-
-PATH NUMBER =      5737
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.55994714265855E-01,  4.29603000234753E-01)
-X( 2) = ( -1.23712945425564E+00,  5.81116952942971E-01)
-X( 3) = (  1.45718793066049E+00, -5.14567318418553E-01)
-X( 4) = ( -2.63481383612544E-01,  2.80583250054433E-01)
-
-X( 5) = ( -1.27179867315621E+00,  2.64503668142155E-01)
-
-PATH NUMBER =      5738
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.22397143615787E-02,  3.73793734877149E-01)
-X( 2) = ( -1.57632532939439E+00,  3.60959827149274E-01)
-X( 3) = (  1.53087125648089E+00, -1.81425776969161E-01)
-X( 4) = ( -3.51359927163519E-01,  2.73092631530393E-01)
-
-X( 5) = ( -1.58249773643522E+00,  1.61060669428586E+00)
-
-PATH NUMBER =      5739
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.87808370174381E-01,  1.20056333481149E-01)
-X( 2) = ( -1.69465017202892E+00, -2.57212214740015E-02)
-X( 3) = (  1.37317670366058E+00,  1.21138178508079E-01)
-X( 4) = ( -4.13863920343992E-01,  2.10867245882662E-01)
-
-X( 5) = (  3.23361638609058E+00,  3.75966736613584E+00)
-
-PATH NUMBER =      5740
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.89844283338997E-01, -2.12882653862957E-01)
-X( 2) = ( -1.53673847325638E+00, -3.97993832794864E-01)
-X( 3) = (  1.05789130604393E+00,  2.51551510621564E-01)
-X( 4) = ( -4.21747050090311E-01,  1.23023042613943E-01)
-
-X( 5) = (  1.83584285024329E+00, -1.28704174795831E+00)
-
-PATH NUMBER =      5741
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -7.73948274590491E-02, -4.69237374772183E-01)
-X( 2) = ( -1.17647887192550E+00, -5.81667514627065E-01)
-X( 3) = (  7.32540605182654E-01,  1.48792371892653E-01)
-X( 4) = ( -3.71320712382947E-01,  5.06633007132416E-02)
-
-X( 5) = (  4.71439888399356E-01, -1.20543978994164E+00)
-
-PATH NUMBER =      5742
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.50132535946537E-01, -5.29056606267734E-01)
-X( 2) = ( -7.82440839338476E-01, -4.90799309935724E-01)
-X( 3) = (  5.49359809880014E-01, -1.39057094626781E-01)
-X( 4) = ( -2.86179951061492E-01,  2.76459476048486E-02)
-
-X( 5) = ( -7.70035040285823E-02, -9.73634980272121E-01)
-
-PATH NUMBER =      5743
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.35669548219465E-01, -3.32269450856244E-01)
-X( 2) = ( -5.32255893885952E-01, -3.01595849946508E-01)
-X( 3) = (  5.21738245962904E-01, -7.00727598227125E-01)
-X( 4) = ( -5.14863152315516E-01,  2.27183036208604E-01)
-
-X( 5) = ( -3.35735790794227E-01, -4.37323073094305E-01)
-
-PATH NUMBER =      5744
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.51454520966950E-01, -2.01054645894149E-02)
-X( 2) = ( -5.53319620078086E-01,  1.02234957679389E-01)
-X( 3) = (  7.73405621003787E-01, -9.31110000947605E-01)
-X( 4) = ( -4.77410946471905E-01,  3.07033396633346E-01)
-
-X( 5) = ( -4.26809059173240E-01, -3.30716236335912E-01)
-
-PATH NUMBER =      5745
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.39495813374166E-01,  2.93451168302136E-01)
-X( 2) = ( -8.29032810030584E-01,  3.98047801611322E-01)
-X( 3) = (  1.11428096912674E+00, -9.45824489905411E-01)
-X( 4) = ( -5.00047714612888E-01,  3.92276135389469E-01)
-
-X( 5) = ( -5.45050351114742E-01, -2.36621181395477E-01)
-
-PATH NUMBER =      5746
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.52180149006213E-01,  4.61683814494645E-01)
-X( 2) = ( -1.23038619795389E+00,  4.47428564579984E-01)
-X( 3) = (  1.38486492653751E+00, -7.37985992183858E-01)
-X( 4) = ( -5.72181461345642E-01,  4.43025227645470E-01)
-
-X( 5) = ( -7.35542210030160E-01, -1.48247316694926E-01)
-
-PATH NUMBER =      5747
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.23945720378780E-01,  4.05874549137043E-01)
-X( 2) = ( -1.56958207309264E+00,  2.27271438786289E-01)
-X( 3) = (  1.45854825235791E+00, -4.04844450734467E-01)
-X( 4) = ( -6.60060004896618E-01,  4.35534609121430E-01)
-
-X( 5) = ( -1.14188501611257E+00, -1.37790240334580E-01)
-
-PATH NUMBER =      5748
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.37706456597737E-03,  1.52137147741043E-01)
-X( 2) = ( -1.68790691572716E+00, -1.59409609836988E-01)
-X( 3) = (  1.30085369953760E+00, -1.02280495257226E-01)
-X( 4) = ( -7.22563998077090E-01,  3.73309223473699E-01)
-
-X( 5) = ( -1.69281032133516E+00, -1.07357735475962E+00)
-
-PATH NUMBER =      5749
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.34115140136129E-03, -1.80801839603064E-01)
-X( 2) = ( -1.52999521695463E+00, -5.31682221157850E-01)
-X( 3) = (  9.85568301920949E-01,  2.81328368562579E-02)
-X( 4) = ( -7.30447127823409E-01,  2.85465020204980E-01)
-
-X( 5) = ( -3.81011665867414E-01, -1.37336238501511E+00)
-
-PATH NUMBER =      5750
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.18790607281309E-01, -4.37156560512289E-01)
-X( 2) = ( -1.16973561562375E+00, -7.15355902990051E-01)
-X( 3) = (  6.60217601059674E-01, -7.46263018726529E-02)
-X( 4) = ( -6.80020790116045E-01,  2.13105278304279E-01)
-
-X( 5) = ( -1.97757238452495E-01, -8.30418040795068E-01)
-
-PATH NUMBER =      5751
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.46317970686895E-01, -4.96975792007840E-01)
-X( 2) = ( -7.75697583036723E-01, -6.24487698298709E-01)
-X( 3) = (  4.77036805757034E-01, -3.62475768392087E-01)
-X( 4) = ( -5.94880028794590E-01,  1.90087925195885E-01)
-
-X( 5) = ( -2.55743357473622E-01, -5.81626620688171E-01)
-
-PATH NUMBER =      5752
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02269782659698E+00, -5.55425140415552E-02)
-X( 2) = ( -1.89658422954840E-01, -5.60805090264898E-01)
-X( 3) = (  6.00956489857016E-01, -3.90040039205818E-01)
-X( 4) = ( -8.11431233268523E-01, -1.05233213529003E-01)
-
-X( 5) = ( -4.64299232828108E-01, -1.15302235680520E-01)
-
-PATH NUMBER =      5753
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.13848279934447E+00,  2.56621472225273E-01)
-X( 2) = ( -2.10722149146974E-01, -1.56974282639000E-01)
-X( 3) = (  8.52623864897899E-01, -6.20422441926297E-01)
-X( 4) = ( -7.73979027424912E-01, -2.53828531042607E-02)
-
-X( 5) = ( -4.15832240333501E-01, -3.47319174508237E-02)
-
-PATH NUMBER =      5754
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.02652409175168E+00,  5.70178105116824E-01)
-X( 2) = ( -4.86435339099473E-01,  1.38838561292934E-01)
-X( 3) = (  1.19349921302085E+00, -6.35136930884105E-01)
-X( 4) = ( -7.96615795565894E-01,  5.98598856518629E-02)
-
-X( 5) = ( -4.00590372162996E-01,  4.29705642056389E-02)
-
-PATH NUMBER =      5755
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.39208427383730E-01,  7.38410751309334E-01)
-X( 2) = ( -8.87788727022777E-01,  1.88219324261596E-01)
-X( 3) = (  1.46408317043163E+00, -4.27298433162552E-01)
-X( 4) = ( -8.68749542298649E-01,  1.10608977907864E-01)
-
-X( 5) = ( -4.11041793068684E-01,  1.23755319654459E-01)
-
-PATH NUMBER =      5756
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.10973998756297E-01,  6.82601485951731E-01)
-X( 2) = ( -1.22698460216152E+00, -3.19378015321010E-02)
-X( 3) = (  1.53776649625202E+00, -9.41568917131592E-02)
-X( 4) = ( -9.56628085849625E-01,  1.03118359383823E-01)
-
-X( 5) = ( -4.60092019370070E-01,  2.13849374663077E-01)
-
-PATH NUMBER =      5757
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.95405342943494E-01,  4.28864084555732E-01)
-X( 2) = ( -1.34530944479605E+00, -4.18618850155376E-01)
-X( 3) = (  1.38007194343171E+00,  2.08407063764081E-01)
-X( 4) = ( -1.01913207903010E+00,  4.08929737360931E-02)
-
-X( 5) = ( -5.96358280514109E-01,  2.95963953631922E-01)
-
-PATH NUMBER =      5758
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.93369429778878E-01,  9.59250972116252E-02)
-X( 2) = ( -1.18739774602352E+00, -7.90891461476239E-01)
-X( 3) = (  1.06478654581506E+00,  3.38820395877566E-01)
-X( 4) = ( -1.02701520877642E+00, -4.69512295326267E-02)
-
-X( 5) = ( -8.53248542409480E-01,  1.98633517728610E-01)
-
-PATH NUMBER =      5759
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.05818885658826E-01, -1.60429623697601E-01)
-X( 2) = ( -8.27138144692637E-01, -9.74565143308440E-01)
-X( 3) = (  7.39435844953786E-01,  2.36061257148654E-01)
-X( 4) = ( -9.76588871069051E-01, -1.19310971433328E-01)
-
-X( 5) = ( -8.12616747984124E-01, -1.39116209220302E-01)
-
-PATH NUMBER =      5760
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.33346249064412E-01, -2.20248855193152E-01)
-X( 2) = ( -4.33100112105612E-01, -8.83696938617099E-01)
-X( 3) = (  5.56255049651146E-01, -5.17882093707796E-02)
-X( 4) = ( -8.91448109747597E-01, -1.42328324541721E-01)
-
-X( 5) = ( -5.80736970912248E-01, -1.88591528668677E-01)
-
-PATH NUMBER =      5761
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04253645298505E+00,  2.41713973354342E-01)
-X( 2) = ( -5.68301074389250E-02, -5.77379024192843E-01)
-X( 3) = (  8.08422174079440E-01, -5.00060539943369E-01)
-X( 4) = ( -1.02501055815880E+00, -3.81035690050733E-01)
-
-X( 5) = ( -3.93893125679448E-01, -5.02031526376158E-03)
-
-PATH NUMBER =      5762
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.15832142573253E+00,  5.53877959621171E-01)
-X( 2) = ( -7.78938336310589E-02, -1.73548216566947E-01)
-X( 3) = (  1.06008954912032E+00, -7.30442942663849E-01)
-X( 4) = ( -9.87558352315192E-01, -3.01185329625992E-01)
-
-X( 5) = ( -3.42072706640844E-01,  3.21048563255374E-02)
-
-PATH NUMBER =      5763
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.04636271813975E+00,  8.67434592512722E-01)
-X( 2) = ( -3.53607023583557E-01,  1.22264627364987E-01)
-X( 3) = (  1.40096489724327E+00, -7.45157431621656E-01)
-X( 4) = ( -1.01019512045617E+00, -2.15942590869868E-01)
-
-X( 5) = ( -3.16495714704845E-01,  7.82492879553965E-02)
-
-PATH NUMBER =      5764
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.59047053771793E-01,  1.03566723870523E+00)
-X( 2) = ( -7.54960411506862E-01,  1.71645390333650E-01)
-X( 3) = (  1.67154885465405E+00, -5.37318933900103E-01)
-X( 4) = ( -1.08232886718893E+00, -1.65193498613867E-01)
-
-X( 5) = ( -3.10839367069626E-01,  1.29656826855228E-01)
-
-PATH NUMBER =      5765
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.30812625144359E-01,  9.79857973347628E-01)
-X( 2) = ( -1.09415628664561E+00, -4.85117354600471E-02)
-X( 3) = (  1.74523218047444E+00, -2.04177392450711E-01)
-X( 4) = ( -1.17020741073991E+00, -1.72684117137907E-01)
-
-X( 5) = ( -3.29463071435429E-01,  1.86774474807244E-01)
-
-PATH NUMBER =      5766
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.15243969331557E-01,  7.26120571951629E-01)
-X( 2) = ( -1.21248112928014E+00, -4.35192784083323E-01)
-X( 3) = (  1.58753762765413E+00,  9.83865630265293E-02)
-X( 4) = ( -1.23271140392038E+00, -2.34909502785638E-01)
-
-X( 5) = ( -3.91441741081041E-01,  2.40370718738227E-01)
-
-PATH NUMBER =      5767
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.13208056166941E-01,  3.93181584607523E-01)
-X( 2) = ( -1.05456943050760E+00, -8.07465395404185E-01)
-X( 3) = (  1.27225223003749E+00,  2.28799895140013E-01)
-X( 4) = ( -1.24059453366670E+00, -3.22753706054357E-01)
-
-X( 5) = ( -5.12740523589444E-01,  2.30927260072808E-01)
-
-PATH NUMBER =      5768
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.25657512046889E-01,  1.36826863698297E-01)
-X( 2) = ( -6.94309829176722E-01, -9.91139077236386E-01)
-X( 3) = (  9.46901529176211E-01,  1.26040756411103E-01)
-X( 4) = ( -1.19016819595933E+00, -3.95113447955059E-01)
-
-X( 5) = ( -5.72422786604238E-01,  8.95503828816812E-02)
-
-PATH NUMBER =      5769
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  7.53184875452475E-01,  7.70076322027457E-02)
-X( 2) = ( -3.00271796589696E-01, -9.00270872545044E-01)
-X( 3) = (  7.63720733873570E-01, -1.61808710108331E-01)
-X( 4) = ( -1.10502743463788E+00, -4.18130801063451E-01)
-
-X( 5) = ( -4.83576622521737E-01, -8.04838378656176E-03)
-
-PATH NUMBER =      5770
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.66660935491709E-01,  4.82177676940483E-01)
-X( 2) = (  5.55758049235438E-02, -5.04694998749803E-01)
-X( 3) = (  1.03806992330151E+00, -4.50984761909224E-01)
-X( 4) = ( -1.01133939852707E+00, -7.29598788313345E-01)
-
-X( 5) = ( -3.58443859857169E-01,  8.96066334074223E-02)
-
-PATH NUMBER =      5771
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.82445908239193E-01,  7.94341663207313E-01)
-X( 2) = (  3.45120787314100E-02, -1.00864191123906E-01)
-X( 3) = (  1.28973729834240E+00, -6.81367164629702E-01)
-X( 4) = ( -9.73887192683462E-01, -6.49748427888605E-01)
-
-X( 5) = ( -3.03543982377084E-01,  9.76889227856684E-02)
-
-PATH NUMBER =      5772
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.70487200646409E-01,  1.10789829609886E+00)
-X( 2) = ( -2.41201111221089E-01,  1.94948652808028E-01)
-X( 3) = (  1.63061264646534E+00, -6.96081653587510E-01)
-X( 4) = ( -9.96523960824445E-01, -5.64505689132481E-01)
-
-X( 5) = ( -2.68280425094351E-01,  1.24724665010386E-01)
-
-PATH NUMBER =      5773
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.83171536278455E-01,  1.27613094229137E+00)
-X( 2) = ( -6.42554499144394E-01,  2.44329415776691E-01)
-X( 3) = (  1.90119660387612E+00, -4.88243155865956E-01)
-X( 4) = ( -1.06865770755720E+00, -5.13756596876480E-01)
-
-X( 5) = ( -2.49106540179129E-01,  1.61371291370364E-01)
-
-PATH NUMBER =      5774
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.54937107651022E-01,  1.22032167693377E+00)
-X( 2) = ( -9.81750374283139E-01,  2.41722899829937E-02)
-X( 3) = (  1.97487992969651E+00, -1.55101614416565E-01)
-X( 4) = ( -1.15653625110817E+00, -5.21247215400520E-01)
-
-X( 5) = ( -2.47107058262269E-01,  2.06330459274327E-01)
-
-PATH NUMBER =      5775
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.93684518382192E-02,  9.66584275537770E-01)
-X( 2) = ( -1.10007521691767E+00, -3.62508758640282E-01)
-X( 3) = (  1.81718537687621E+00,  1.47462341060676E-01)
-X( 4) = ( -1.21904024428865E+00, -5.83472601048251E-01)
-
-X( 5) = ( -2.73028721389086E-01,  2.56921242057438E-01)
-
-PATH NUMBER =      5776
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.73325386736035E-02,  6.33645288193664E-01)
-X( 2) = ( -9.42163518145134E-01, -7.34781369961144E-01)
-X( 3) = (  1.50189997925956E+00,  2.77875673174160E-01)
-X( 4) = ( -1.22692337403497E+00, -6.71316804316970E-01)
-
-X( 5) = ( -3.46360766828355E-01,  2.87619906203597E-01)
-
-PATH NUMBER =      5777
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.49781994553552E-01,  3.77290567284438E-01)
-X( 2) = ( -5.81903916814254E-01, -9.18455051793345E-01)
-X( 3) = (  1.17654927839828E+00,  1.75116534445248E-01)
-X( 4) = ( -1.17649703632760E+00, -7.43676546217670E-01)
-
-X( 5) = ( -4.34414764333895E-01,  2.31556491984346E-01)
-
-PATH NUMBER =      5778
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.77309357959138E-01,  3.17471335788887E-01)
-X( 2) = ( -1.87865884227227E-01, -8.27586847102004E-01)
-X( 3) = (  9.93368483095643E-01, -1.12732932074185E-01)
-X( 4) = ( -1.09135627500615E+00, -7.66693899326064E-01)
-
-X( 5) = ( -4.24906395379115E-01,  1.29034497155947E-01)
-
-PATH NUMBER =      5779
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.77365383390754E-01,  5.53332957352532E-01)
-X( 2) = (  9.49633384856046E-02, -3.76762677233537E-01)
-X( 3) = (  1.18244500341179E+00, -2.65775807062075E-01)
-X( 4) = ( -7.76814641903036E-01, -9.87825960792433E-01)
-
-X( 5) = ( -3.40880787364240E-01,  1.87895999554134E-01)
-
-PATH NUMBER =      5780
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.93150356138240E-01,  8.65496943619360E-01)
-X( 2) = (  7.38996122934707E-02,  2.70681303923599E-02)
-X( 3) = (  1.43411237845267E+00, -4.96158209782556E-01)
-X( 4) = ( -7.39362436059426E-01, -9.07975600367691E-01)
-
-X( 5) = ( -2.83796635415725E-01,  1.67978155985338E-01)
-
-PATH NUMBER =      5781
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.81191648545455E-01,  1.17905357651091E+00)
-X( 2) = ( -2.01813577659029E-01,  3.22880974324294E-01)
-X( 3) = (  1.77498772657562E+00, -5.10872698740362E-01)
-X( 4) = ( -7.61999204200407E-01, -8.22732861611568E-01)
-
-X( 5) = ( -2.38684069479832E-01,  1.78286180831575E-01)
-
-PATH NUMBER =      5782
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.93875984177502E-01,  1.34728622270342E+00)
-X( 2) = ( -6.03166965582333E-01,  3.72261737292956E-01)
-X( 3) = (  2.04557168398640E+00, -3.03034201018810E-01)
-X( 4) = ( -8.34132950933163E-01, -7.71983769355567E-01)
-
-X( 5) = ( -2.06965883944672E-01,  2.03897690013520E-01)
-
-PATH NUMBER =      5783
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.43584444499308E-02,  1.29147695734582E+00)
-X( 2) = ( -9.42362840721079E-01,  1.52104611499260E-01)
-X( 3) = (  2.11925500980679E+00,  3.01073404305814E-02)
-X( 4) = ( -9.22011494484139E-01, -7.79474387879607E-01)
-
-X( 5) = ( -1.88358016871795E-01,  2.41443648580289E-01)
-
-PATH NUMBER =      5784
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.49927100262734E-01,  1.03773955594982E+00)
-X( 2) = ( -1.06068768335561E+00, -2.34576437124016E-01)
-X( 3) = (  1.96156045698648E+00,  3.32671295907822E-01)
-X( 4) = ( -9.84515487664611E-01, -8.41699773527338E-01)
-
-X( 5) = ( -1.89424418559780E-01,  2.91583239035767E-01)
-
-PATH NUMBER =      5785
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -2.51963013427350E-01,  7.04800568605712E-01)
-X( 2) = ( -9.02775984583073E-01, -6.06849048444878E-01)
-X( 3) = (  1.64627505936983E+00,  4.63084628021307E-01)
-X( 4) = ( -9.92398617410930E-01, -9.29543976796057E-01)
-
-X( 5) = ( -2.30302338837558E-01,  3.46014344577744E-01)
-
-PATH NUMBER =      5786
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.95135575474016E-02,  4.48445847696486E-01)
-X( 2) = ( -5.42516383252193E-01, -7.90522730277080E-01)
-X( 3) = (  1.32092435850856E+00,  3.60325489292396E-01)
-X( 4) = ( -9.41972279703565E-01, -1.00190371869676E+00)
-
-X( 5) = ( -3.23705791295100E-01,  3.51686362670072E-01)
-
-PATH NUMBER =      5787
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.88013805858184E-01,  3.88626616200935E-01)
-X( 2) = ( -1.48478350665167E-01, -6.99654525585738E-01)
-X( 3) = (  1.13774356320592E+00,  7.24760227729621E-02)
-X( 4) = ( -8.56831518382111E-01, -1.02492107180515E+00)
-
-X( 5) = ( -3.78686427336821E-01,  2.63561091138990E-01)
-
-PATH NUMBER =      5788
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.10014400672147E-01,  4.21885468082833E-01)
-X( 2) = (  4.29026285498925E-02, -2.53443014690886E-01)
-X( 3) = (  1.17399270987638E+00, -3.10950037431599E-02)
-X( 4) = ( -4.31173028363416E-01, -1.03488984360968E+00)
-
-X( 5) = ( -3.44321123505347E-01,  3.13730088303176E-01)
-
-PATH NUMBER =      5789
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.25799373419632E-01,  7.34049454349662E-01)
-X( 2) = (  2.18389023577586E-02,  1.50387792935011E-01)
-X( 3) = (  1.42566008491726E+00, -2.61477406463639E-01)
-X( 4) = ( -3.93720822519805E-01, -9.55039483184938E-01)
-
-X( 5) = ( -2.84078360780873E-01,  2.55450579679708E-01)
-
-PATH NUMBER =      5790
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.13840665826849E-01,  1.04760608724121E+00)
-X( 2) = ( -2.53874287594740E-01,  4.46200636866945E-01)
-X( 3) = (  1.76653543304021E+00, -2.76191895421447E-01)
-X( 4) = ( -4.16357590660787E-01, -8.69796744428815E-01)
-
-X( 5) = ( -2.24906998552077E-01,  2.45808505035260E-01)
-
-PATH NUMBER =      5791
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.65250014588935E-02,  1.21583873343372E+00)
-X( 2) = ( -6.55227675518045E-01,  4.95581399835607E-01)
-X( 3) = (  2.03711939045099E+00, -6.83533976998923E-02)
-X( 4) = ( -4.88491337393542E-01, -8.19047652172814E-01)
-
-X( 5) = ( -1.77623198821669E-01,  2.60281151179092E-01)
-
-PATH NUMBER =      5792
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.01709427168539E-01,  1.16002946807612E+00)
-X( 2) = ( -9.94423550656791E-01,  2.75424274041911E-01)
-X( 3) = (  2.11080271627138E+00,  2.64788143749498E-01)
-X( 4) = ( -5.76369880944518E-01, -8.26538270696855E-01)
-
-X( 5) = ( -1.41023424069153E-01,  2.91412958190807E-01)
-
-PATH NUMBER =      5793
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.17278082981341E-01,  9.06292066680120E-01)
-X( 2) = ( -1.11274839329132E+00, -1.11256774581365E-01)
-X( 3) = (  1.95310816345107E+00,  5.67352099226739E-01)
-X( 4) = ( -6.38873874124990E-01, -8.88763656344585E-01)
-
-X( 5) = ( -1.17855900302095E-01,  3.41370357154237E-01)
-
-PATH NUMBER =      5794
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.19313996145958E-01,  5.73353079336014E-01)
-X( 2) = ( -9.54836694518785E-01, -4.83529385902228E-01)
-X( 3) = (  1.63782276583442E+00,  6.97765431340224E-01)
-X( 4) = ( -6.46757003871309E-01, -9.76607859613304E-01)
-
-X( 5) = ( -1.25779707188384E-01,  4.14647450033802E-01)
-
-PATH NUMBER =      5795
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.06864540266009E-01,  3.16998358426787E-01)
-X( 2) = ( -5.94577093187904E-01, -6.67203067734429E-01)
-X( 3) = (  1.31247206497315E+00,  5.95006292611312E-01)
-X( 4) = ( -5.96330666163944E-01, -1.04896760151401E+00)
-
-X( 5) = ( -2.08611030015610E-01,  4.82961608259156E-01)
-
-PATH NUMBER =      5796
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.06628231395763E-02,  2.57179126931237E-01)
-X( 2) = ( -2.00539060600879E-01, -5.76334863043087E-01)
-X( 3) = (  1.12929126967051E+00,  3.07156826091879E-01)
-X( 4) = ( -5.11189904842490E-01, -1.07198495462240E+00)
-
-X( 5) = ( -3.35118748886803E-01,  4.33611946816509E-01)
-
-PATH NUMBER =      5797
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.89704483425125E-01,  1.49340950236798E-01)
-X( 2) = ( -7.62465401143295E-02, -1.92438651770941E-01)
-X( 3) = (  1.01666796477729E+00,  1.43247891988001E-01)
-X( 4) = ( -1.36144110262046E-01, -8.48768722938104E-01)
-
-X( 5) = ( -4.14854338359222E-01,  5.15867011585036E-01)
-
-PATH NUMBER =      5798
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.05489456172610E-01,  4.61504936503627E-01)
-X( 2) = ( -9.73102663064634E-02,  2.11392155854956E-01)
-X( 3) = (  1.26833533981817E+00, -8.71345107324798E-02)
-X( 4) = ( -9.86919044184353E-02, -7.68918362513363E-01)
-
-X( 5) = ( -3.34834671921809E-01,  3.79785319042119E-01)
-
-PATH NUMBER =      5799
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.93530748579827E-01,  7.75061569395178E-01)
-X( 2) = ( -3.73023456258962E-01,  5.07204999786890E-01)
-X( 3) = (  1.60921068794112E+00, -1.01848999690286E-01)
-X( 4) = ( -1.21328672559417E-01, -6.83675623757239E-01)
-
-X( 5) = ( -2.42865705400799E-01,  3.40960737838450E-01)
-
-PATH NUMBER =      5800
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.37849157881271E-02,  9.43294215587689E-01)
-X( 2) = ( -7.74376844182267E-01,  5.56585762755553E-01)
-X( 3) = (  1.87979464535190E+00,  1.05989498031266E-01)
-X( 4) = ( -1.93462419292173E-01, -6.32926531501239E-01)
-
-X( 5) = ( -1.67588230599986E-01,  3.43242551975959E-01)
-
-PATH NUMBER =      5801
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.22019344415561E-01,  8.87484950230084E-01)
-X( 2) = ( -1.11357271932101E+00,  3.36428636961855E-01)
-X( 3) = (  1.95347797117229E+00,  4.39131039480658E-01)
-X( 4) = ( -2.81340962843147E-01, -6.40417150025278E-01)
-
-X( 5) = ( -1.03631843886170E-01,  3.69030583210694E-01)
-
-PATH NUMBER =      5802
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.37588000228363E-01,  6.33747548834085E-01)
-X( 2) = ( -1.23189756195554E+00, -5.02524116614195E-02)
-X( 3) = (  1.79578341835198E+00,  7.41694994957899E-01)
-X( 4) = ( -3.43844956023620E-01, -7.02642535673009E-01)
-
-X( 5) = ( -4.71657656691037E-02,  4.20476040214373E-01)
-
-PATH NUMBER =      5803
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -6.39623913392979E-01,  3.00808561489978E-01)
-X( 2) = ( -1.07398586318301E+00, -4.22525022982282E-01)
-X( 3) = (  1.48049802073533E+00,  8.72108327071383E-01)
-X( 4) = ( -3.51728085769939E-01, -7.90486738941727E-01)
-
-X( 5) = ( -7.90248154188973E-03,  5.15400658154419E-01)
-
-PATH NUMBER =      5804
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -4.27174457513031E-01,  4.44538405807524E-02)
-X( 2) = ( -7.13726261852127E-01, -6.06198704814484E-01)
-X( 3) = (  1.15514731987406E+00,  7.69349188342473E-01)
-X( 4) = ( -3.01301748062574E-01, -8.62846480842430E-01)
-
-X( 5) = ( -5.17954958986346E-02,  6.73385502134134E-01)
-
-PATH NUMBER =      5805
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.96470941074450E-02, -1.53653909147986E-02)
-X( 2) = ( -3.19688229265101E-01, -5.15330500123142E-01)
-X( 3) = (  9.71966524571415E-01,  4.81499721823039E-01)
-X( 4) = ( -2.16160986741120E-01, -8.85863833950822E-01)
-
-X( 5) = ( -2.95969933574591E-01,  7.31168367086094E-01)
-
-PATH NUMBER =      5806
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.72729979025364E-01, -1.36773987290496E-01)
-X( 2) = ( -2.06732947293564E-01, -2.22294207871918E-01)
-X( 3) = (  7.84084764816154E-01,  1.75675901613337E-01)
-X( 4) = ( -2.97751972597499E-02, -5.16550739645782E-01)
-
-X( 5) = ( -8.87074800490658E-01,  7.89580661417084E-01)
-
-PATH NUMBER =      5807
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  3.88514951772849E-01,  1.75389998976333E-01)
-X( 2) = ( -2.27796673485698E-01,  1.81536599753979E-01)
-X( 3) = (  1.03575213985704E+00, -5.47065011071435E-02)
-X( 4) = (  7.67700858386051E-03, -4.36700379221040E-01)
-
-X( 5) = ( -5.73401127429147E-01,  5.01303842804138E-01)
-
-PATH NUMBER =      5808
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.76556244180065E-01,  4.88946631867884E-01)
-X( 2) = ( -5.03509863438197E-01,  4.77349443685913E-01)
-X( 3) = (  1.37662748797999E+00, -6.94209900649498E-02)
-X( 4) = ( -1.49597595571215E-02, -3.51457640464916E-01)
-
-X( 5) = ( -3.67633365009900E-01,  4.57164373951990E-01)
-
-PATH NUMBER =      5809
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.07594201878883E-02,  6.57179278060394E-01)
-X( 2) = ( -9.04863251361501E-01,  5.26730206654575E-01)
-X( 3) = (  1.64721144539076E+00,  1.38417507656603E-01)
-X( 4) = ( -8.70935062898768E-02, -3.00708548208916E-01)
-
-X( 5) = ( -2.24487489102140E-01,  4.68789974389857E-01)
-
-PATH NUMBER =      5810
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.38993848815322E-01,  6.01370012702790E-01)
-X( 2) = ( -1.24405912650025E+00,  3.06573080860879E-01)
-X( 3) = (  1.72089477121116E+00,  4.71559049105995E-01)
-X( 4) = ( -1.74972049840852E-01, -3.08199166732956E-01)
-
-X( 5) = ( -1.03677731347865E-01,  5.06656590110287E-01)
-
-PATH NUMBER =      5811
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.54562504628124E-01,  3.47632611306791E-01)
-X( 2) = ( -1.36238396913477E+00, -8.01079677623966E-02)
-X( 3) = (  1.56320021839085E+00,  7.74123004583235E-01)
-X( 4) = ( -2.37476043021324E-01, -3.70424552380686E-01)
-
-X( 5) = (  1.80747063587241E-02,  5.77009111732330E-01)
-
-PATH NUMBER =      5812
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -5.56598417792740E-01,  1.46936239626843E-02)
-X( 2) = ( -1.20447227036224E+00, -4.52380579083259E-01)
-X( 3) = (  1.24791482077420E+00,  9.04536336696719E-01)
-X( 4) = ( -2.45359172767643E-01, -4.58268755649405E-01)
-
-X( 5) = (  1.57196328013065E-01,  7.21941806964754E-01)
-
-PATH NUMBER =      5813
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.44148961912792E-01, -2.41661096946542E-01)
-X( 2) = ( -8.44212669031361E-01, -6.36054260915460E-01)
-X( 3) = (  9.22564119912924E-01,  8.01777197967809E-01)
-X( 4) = ( -1.94932835060279E-01, -5.30628497550107E-01)
-
-X( 5) = (  2.61884892704971E-01,  1.10194466775494E+00)
-
-PATH NUMBER =      5814
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.66215985072064E-02, -3.01480328442092E-01)
-X( 2) = ( -4.50174636444336E-01, -5.45186056224119E-01)
-X( 3) = (  7.39383324610284E-01,  5.13927731448375E-01)
-X( 4) = ( -1.09792073738824E-01, -5.53645850658500E-01)
-
-X( 5) = ( -4.70058007296745E-01,  1.65963621887863E+00)
-
-PATH NUMBER =      5815
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.20242335355909E-01, -3.02582985416696E-01)
-X( 2) = ( -2.87500552873768E-01, -3.29039936486622E-01)
-X( 3) = (  5.85071374129137E-01,  5.10155990319722E-02)
-X( 4) = ( -1.61837485909090E-01, -1.93684380306803E-01)
-
-X( 5) = ( -1.25000691204745E+00, -1.87334694807195E-01)
-
-PATH NUMBER =      5816
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  6.36027308103394E-01,  9.58100085013311E-03)
-X( 2) = ( -3.08564279065902E-01,  7.47908711392744E-02)
-X( 3) = (  8.36738749170020E-01, -1.79366803688508E-01)
-X( 4) = ( -1.24385280065479E-01, -1.13834019882061E-01)
-
-X( 5) = ( -8.52842652170654E-01,  1.39711766967233E-01)
-
-PATH NUMBER =      5817
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.24068600510611E-01,  3.23137633741684E-01)
-X( 2) = ( -5.84277469018401E-01,  3.70603715071208E-01)
-X( 3) = (  1.17761409729297E+00, -1.94081292646315E-01)
-X( 4) = ( -1.47022048206462E-01, -2.85912811259377E-02)
-
-X( 5) = ( -6.37409191321365E-01,  3.39798440149814E-01)
-
-PATH NUMBER =      5818
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.36752936142657E-01,  4.91370279934194E-01)
-X( 2) = ( -9.85630856941705E-01,  4.19984478039871E-01)
-X( 3) = (  1.44819805470375E+00,  1.37572050752383E-02)
-X( 4) = ( -2.19155794939217E-01,  2.21578111300633E-02)
-
-X( 5) = ( -4.71302186483256E-01,  5.06606762017250E-01)
-
-PATH NUMBER =      5819
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.14814924847767E-02,  4.35561014576590E-01)
-X( 2) = ( -1.32482673208045E+00,  1.99827352246174E-01)
-X( 3) = (  1.52188138052414E+00,  3.46898746524630E-01)
-X( 4) = ( -3.07034338490192E-01,  1.46671926060231E-02)
-
-X( 5) = ( -3.04916092864599E-01,  6.85961006468464E-01)
-
-PATH NUMBER =      5820
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.07050148297579E-01,  1.81823613180591E-01)
-X( 2) = ( -1.44315157471498E+00, -1.86853696377101E-01)
-X( 3) = (  1.36418682770383E+00,  6.49462702001870E-01)
-X( 4) = ( -3.69538331670664E-01, -4.75581930417075E-02)
-
-X( 5) = ( -8.84741209145571E-02,  9.40202423205808E-01)
-
-PATH NUMBER =      5821
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -3.09086061462196E-01, -1.51115374163515E-01)
-X( 2) = ( -1.28523987594245E+00, -5.59126307697964E-01)
-X( 3) = (  1.04890143008718E+00,  7.79876034115355E-01)
-X( 4) = ( -3.77421461416984E-01, -1.35402396310427E-01)
-
-X( 5) = (  3.09530527126687E-01,  1.48504680170877E+00)
-
-PATH NUMBER =      5822
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -9.66366055822473E-02, -4.07470095072741E-01)
-X( 2) = ( -9.24980274611565E-01, -7.42799989530165E-01)
-X( 3) = (  7.23550729225907E-01,  6.77116895386444E-01)
-X( 4) = ( -3.26995123709619E-01, -2.07762138211128E-01)
-
-X( 5) = (  1.42236216946676E+00,  5.10220656829437E+00)
-
-PATH NUMBER =      5823
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.30890757823339E-01, -4.67289326568292E-01)
-X( 2) = ( -5.30942242024540E-01, -6.51931784838823E-01)
-X( 3) = (  5.40369933923267E-01,  3.89267428867010E-01)
-X( 4) = ( -2.41854362388164E-01, -2.30779491319521E-01)
-
-X( 5) = ( -2.80002869257197E+00, -1.07275640777478E+00)
-
-PATH NUMBER =      5824
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.16427770096267E-01, -2.70502171156803E-01)
-X( 2) = ( -2.80757296572015E-01, -4.62728324849608E-01)
-X( 3) = (  5.12748370006157E-01, -1.72403074733333E-01)
-X( 4) = ( -4.70537563642189E-01, -3.12424027157660E-02)
-
-X( 5) = ( -6.44562532066516E-01, -2.59390720561233E-01)
-
-PATH NUMBER =      5825
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  9.32212742843752E-01,  4.16618151100266E-02)
-X( 2) = ( -3.01821022764149E-01, -5.88975172237111E-02)
-X( 3) = (  7.64415745047041E-01, -4.02785477453813E-01)
-X( 4) = ( -4.33085357798578E-01,  4.86079577089757E-02)
-
-X( 5) = ( -5.79132164055228E-01, -7.96241767899849E-02)
-
-PATH NUMBER =      5826
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  8.20254035250969E-01,  3.55218448001577E-01)
-X( 2) = ( -5.77534212716648E-01,  2.36915326708223E-01)
-X( 3) = (  1.10529109316999E+00, -4.17499966411620E-01)
-X( 4) = ( -4.55722125939560E-01,  1.33850696465099E-01)
-
-X( 5) = ( -5.54147799036377E-01,  7.22009985001184E-02)
-
-PATH NUMBER =      5827
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.32938370883015E-01,  5.23451094194087E-01)
-X( 2) = ( -9.78887600639952E-01,  2.86296089676885E-01)
-X( 3) = (  1.37587505058077E+00, -2.09661468690067E-01)
-X( 4) = ( -5.27855872672315E-01,  1.84599788721100E-01)
-
-X( 5) = ( -5.54931465847275E-01,  2.30345809478993E-01)
-
-PATH NUMBER =      5828
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  2.04703942255581E-01,  4.67641828836484E-01)
-X( 2) = ( -1.31808347577870E+00,  6.61389638831889E-02)
-X( 3) = (  1.44955837640116E+00,  1.23480072759324E-01)
-X( 4) = ( -6.15734416223290E-01,  1.77109170197060E-01)
-
-X( 5) = ( -5.97052592522207E-01,  4.35133480721387E-01)
-
-PATH NUMBER =      5829
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.08647135572215E-02,  2.13904427440484E-01)
-X( 2) = ( -1.43640831841323E+00, -3.20542084740087E-01)
-X( 3) = (  1.29186382358085E+00,  4.26044028236566E-01)
-X( 4) = ( -6.78238409403763E-01,  1.14883784549329E-01)
-
-X( 5) = ( -7.88094134001552E-01,  7.66589738895862E-01)
-
-PATH NUMBER =      5830
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = ( -1.29006267218376E-02, -1.19034559903622E-01)
-X( 2) = ( -1.27849661964069E+00, -6.92814696060950E-01)
-X( 3) = (  9.76578425964203E-01,  5.56457360350050E-01)
-X( 4) = ( -6.86121539150082E-01,  2.70395812806104E-02)
-
-X( 5) = ( -1.85320884491589E+00,  9.98120110818909E-01)
-
-PATH NUMBER =      5831
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  1.99548829158111E-01, -3.75389280812848E-01)
-X( 2) = ( -9.18237018309812E-01, -8.76488377893150E-01)
-X( 3) = (  6.51227725102927E-01,  4.53698221621138E-01)
-X( 4) = ( -6.35695201442717E-01, -4.53201606200913E-02)
-
-X( 5) = ( -1.62575978765842E+00, -7.71314732877699E-01)
-
-PATH NUMBER =      5832
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-COMPLEX, FINITE SOLUTION
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  5.27076192563697E-01, -4.35208512308399E-01)
-X( 2) = ( -5.24198985722786E-01, -7.85620173201809E-01)
-X( 3) = (  4.68046929800287E-01,  1.65848755101704E-01)
-X( 4) = ( -5.50554440121263E-01, -6.83375137284841E-02)
-
-X( 5) = ( -8.32740584567082E-01, -5.19740316030978E-01)
-
-
-Testing optional arguments.
-
-PATH NUMBER =        13
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.76475571999980E-01,  1.34362698410693E+00)
-X( 2) = ( -5.45438500038628E-01, -3.15352732794887E-01)
-X( 3) = (  1.61091849504789E+00,  4.08203372822907E-01)
-X( 4) = ( -7.60776109479709E-01, -5.81981380525629E-01)
-
-X( 5) = ( -2.16331016556197E-01,  2.30736230057938E-01)
-
-
-Statistics for retracked path.
-
-PATH NUMBER =        13
-
-ARCLEN =  0.00000000000000E+00
-NFE =    1
-IFLAG2 =  4
-LAMBDA =  0.00000000000000E+00
-
-X( 1) = (  4.76475571999980E-01,  1.34362698410693E+00)
-X( 2) = ( -5.45438500038628E-01, -3.15352732794887E-01)
-X( 3) = (  1.61091849504789E+00,  4.08203372822907E-01)
-X( 4) = ( -7.60776109479709E-01, -5.81981380525629E-01)
-
-X( 5) = ( -2.16331016556197E-01,  2.30736230057938E-01)
diff --git a/sandbox/801/README b/sandbox/801/README
deleted file mode 100644
index 27ed976..0000000
--- a/sandbox/801/README
+++ /dev/null
@@ -1,45 +0,0 @@
-				POLSYS_PLP
-
-POLSYS_PLP is Fortran 90 code for solving N complex coefficient
-polynomial systems of equations in N unknowns by a probability-one,
-globally convergent homotopy method.  The package consists of 2
-modules:  GLOBAL_PLP contains the derived data types which define the
-polynomial system, the system partition, and the start system of the
-homotopy; the module POLSYS contains the actual solver POLSYS_PLP and
-its internal routines, and the routines responsible for root counting,
-BEZOUT_PLP and SINGSYS_PLP.  POLSYS_PLP uses the HOMPACK90 modules
-HOMOTOPY, HOMPACK90_GLOBAL, and REAL_PRECISION, the HOMPACK90 path
-tracking routine STEPNX, and numerous BLAS and LAPACK routines.
-
-The physical organization into files is as follows:  The file
-polsys_plp.f90 contains (in order) REAL_PRECISION, GLOBAL_PLP, POLSYS,
-HOMPACK90_GLOBAL, HOMOTOPY, and STEPNX; the file lapack_plp.f contains
-all the necessary BLAS and LAPACK routines.  A sample calling program
-MAIN_TEMPLATE and a template for a hand-crafted function/Jacobian
-evaluation program TARGET_SYSTEM_USER are contained in the file
-main_template.f90.  MAIN_TEMPLATE reads the data file INPUT.DAT and
-writes the solutions to the file OUTPUT.DAT.  The file test_install.f90
-contains a main program TEST_INSTALL to verify the installation.  It
-reads INPUT.DAT, solves a problem defined there, compares the computed
-results to known answers, and prints a message indicating whether the
-installation was apparently successful.
-
-To test the package, compile polsys_plp.f90 (as free form Fortran 90
-files) and compile lapack_plp.f (as fixed form Fortran 90 files). Then
-compile main_template.f90 and link to the object files from the two
-compiles above.  Do the same for test_install.f90.  TEST_INSTALL
-provides a simple test of the installation.  MAIN_TEMPLATE produces
-detailed output in the file OUTPUT.DAT, which, with an understanding of
-how POLSYS_PLP works, can be compared to the file OUTPUT.DAT in the
-package.  The modules and external subroutines in polsys_plp.f90 and
-lapack_plp.f can be stored in module and object libraries and need not
-be recompiled.  The subroutine TARGET_SYSTEM_USER defining the
-polynomial system and its Jacobian matrix, or a dummy subroutine, must
-be supplied on every call to POLSYS_PLP.  However, if the user does not
-wish to change TARGET_SYSTEM_USER, its object code can be stored in the
-aforementioned object library.
-
--------------------------------------------------------------------------------
-
-Inquiries should be directed to Layne T. Watson, Department of Computer
-Science, VPI & SU, Blacksburg, VA 24061-0106; (540) 231-7540; ltw@vt.edu.
diff --git a/sandbox/801/Src/lapack_plp.f b/sandbox/801/Src/lapack_plp.f
deleted file mode 100644
index 911b89c..0000000
--- a/sandbox/801/Src/lapack_plp.f
+++ /dev/null
@@ -1,8114 +0,0 @@
-* This file contains the BLAS and LAPACK (double precision) routines
-* used by the POLSYS_PLP package.  The file is in fixed source form.
-*
-      SUBROUTINE DTRSV ( UPLO, TRANS, DIAG, N, A, LDA, X, INCX )
-*     .. Scalar Arguments ..
-      INTEGER            INCX, LDA, N
-      CHARACTER*1        DIAG, TRANS, UPLO
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DTRSV  solves one of the systems of equations
-*
-*     A*x = b,   or   A'*x = b,
-*
-*  where b and x are n element vectors and A is an n by n unit, or
-*  non-unit, upper or lower triangular matrix.
-*
-*  No test for singularity or near-singularity is included in this
-*  routine. Such tests must be performed before calling this routine.
-*
-*  Parameters
-*  ==========
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the equations to be solved as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   A*x = b.
-*
-*              TRANS = 'T' or 't'   A'*x = b.
-*
-*              TRANS = 'C' or 'c'   A'*x = b.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit
-*           triangular as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the order of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry with  UPLO = 'U' or 'u', the leading n by n
-*           upper triangular part of the array A must contain the upper
-*           triangular matrix and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry with UPLO = 'L' or 'l', the leading n by n
-*           lower triangular part of the array A must contain the lower
-*           triangular matrix and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u', the diagonal elements of
-*           A are not referenced either, but are assumed to be unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, n ).
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the n
-*           element right-hand side vector b. On exit, X is overwritten
-*           with the solution vector x.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER        ( ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, J, JX, KX
-      LOGICAL            NOUNIT
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( UPLO , 'U' ).AND.
-     $         .NOT.LSAME( UPLO , 'L' )      )THEN
-         INFO = 1
-      ELSE IF( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 2
-      ELSE IF( .NOT.LSAME( DIAG , 'U' ).AND.
-     $         .NOT.LSAME( DIAG , 'N' )      )THEN
-         INFO = 3
-      ELSE IF( N.LT.0 )THEN
-         INFO = 4
-      ELSE IF( LDA.LT.MAX( 1, N ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DTRSV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      NOUNIT = LSAME( DIAG, 'N' )
-*
-*     Set up the start point in X if the increment is not unity. This
-*     will be  ( N - 1 )*INCX  too small for descending loops.
-*
-      IF( INCX.LE.0 )THEN
-         KX = 1 - ( N - 1 )*INCX
-      ELSE IF( INCX.NE.1 )THEN
-         KX = 1
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  x := inv( A )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 20, J = N, 1, -1
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 10, I = J - 1, 1, -1
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   10                CONTINUE
-                  END IF
-   20          CONTINUE
-            ELSE
-               JX = KX + ( N - 1 )*INCX
-               DO 40, J = N, 1, -1
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 30, I = J - 1, 1, -1
-                        IX      = IX      - INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   30                CONTINUE
-                  END IF
-                  JX = JX - INCX
-   40          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 60, J = 1, N
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 50, I = J + 1, N
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   50                CONTINUE
-                  END IF
-   60          CONTINUE
-            ELSE
-               JX = KX
-               DO 80, J = 1, N
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 70, I = J + 1, N
-                        IX      = IX      + INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   70                CONTINUE
-                  END IF
-                  JX = JX + INCX
-   80          CONTINUE
-            END IF
-         END IF
-      ELSE
-*
-*        Form  x := inv( A' )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 100, J = 1, N
-                  TEMP = X( J )
-                  DO 90, I = 1, J - 1
-                     TEMP = TEMP - A( I, J )*X( I )
-   90             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( J ) = TEMP
-  100          CONTINUE
-            ELSE
-               JX = KX
-               DO 120, J = 1, N
-                  TEMP = X( JX )
-                  IX   = KX
-                  DO 110, I = 1, J - 1
-                     TEMP = TEMP - A( I, J )*X( IX )
-                     IX   = IX   + INCX
-  110             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( JX ) = TEMP
-                  JX      = JX   + INCX
-  120          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 140, J = N, 1, -1
-                  TEMP = X( J )
-                  DO 130, I = N, J + 1, -1
-                     TEMP = TEMP - A( I, J )*X( I )
-  130             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( J ) = TEMP
-  140          CONTINUE
-            ELSE
-               KX = KX + ( N - 1 )*INCX
-               JX = KX
-               DO 160, J = N, 1, -1
-                  TEMP = X( JX )
-                  IX   = KX
-                  DO 150, I = N, J + 1, -1
-                     TEMP = TEMP - A( I, J )*X( IX )
-                     IX   = IX   - INCX
-  150             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( JX ) = TEMP
-                  JX      = JX   - INCX
-  160          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DTRSV .
-*
-      END
-      SUBROUTINE DORMQR( SIDE, TRANS, M, N, K, A, LDA, TAU, C, LDC,
-     $                   WORK, LWORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     March 31, 1993
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE, TRANS
-      INTEGER            INFO, K, LDA, LDC, LWORK, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), C( LDC, * ), TAU( * ),
-     $                   WORK( LWORK )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DORMQR overwrites the general real M-by-N matrix C with
-*
-*                  SIDE = 'L'     SIDE = 'R'
-*  TRANS = 'N':      Q * C          C * Q
-*  TRANS = 'T':      Q**T * C       C * Q**T
-*
-*  where Q is a real orthogonal matrix defined as the product of k
-*  elementary reflectors
-*
-*        Q = H(1) H(2) . . . H(k)
-*
-*  as returned by DGEQRF. Q is of order M if SIDE = 'L' and of order N
-*  if SIDE = 'R'.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': apply Q or Q**T from the Left;
-*          = 'R': apply Q or Q**T from the Right.
-*
-*  TRANS   (input) CHARACTER*1
-*          = 'N':  No transpose, apply Q;
-*          = 'T':  Transpose, apply Q**T.
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C. M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C. N >= 0.
-*
-*  K       (input) INTEGER
-*          The number of elementary reflectors whose product defines
-*          the matrix Q.
-*          If SIDE = 'L', M >= K >= 0;
-*          if SIDE = 'R', N >= K >= 0.
-*
-*  A       (input) DOUBLE PRECISION array, dimension (LDA,K)
-*          The i-th column must contain the vector which defines the
-*          elementary reflector H(i), for i = 1,2,...,k, as returned by
-*          DGEQRF in the first k columns of its array argument A.
-*          A is modified by the routine but restored on exit.
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.
-*          If SIDE = 'L', LDA >= max(1,M);
-*          if SIDE = 'R', LDA >= max(1,N).
-*
-*  TAU     (input) DOUBLE PRECISION array, dimension (K)
-*          TAU(i) must contain the scalar factor of the elementary
-*          reflector H(i), as returned by DGEQRF.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the M-by-N matrix C.
-*          On exit, C is overwritten by Q*C or Q**T*C or C*Q**T or C*Q.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDC >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (LWORK)
-*          On exit, if INFO = 0, WORK(1) returns the optimal LWORK.
-*
-*  LWORK   (input) INTEGER
-*          The dimension of the array WORK.
-*          If SIDE = 'L', LWORK >= max(1,N);
-*          if SIDE = 'R', LWORK >= max(1,M).
-*          For optimum performance LWORK >= N*NB if SIDE = 'L', and
-*          LWORK >= M*NB if SIDE = 'R', where NB is the optimal
-*          blocksize.
-*
-*  INFO    (output) INTEGER
-*          = 0:  successful exit
-*          < 0:  if INFO = -i, the i-th argument had an illegal value
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      INTEGER            NBMAX, LDT
-      PARAMETER          ( NBMAX = 64, LDT = NBMAX+1 )
-*     ..
-*     .. Local Scalars ..
-      LOGICAL            LEFT, NOTRAN
-      INTEGER            I, I1, I2, I3, IB, IC, IINFO, IWS, JC, LDWORK,
-     $                   MI, NB, NBMIN, NI, NQ, NW
-*     ..
-*     .. Local Arrays ..
-      DOUBLE PRECISION   T( LDT, NBMAX )
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      INTEGER            ILAENV
-      EXTERNAL           LSAME, ILAENV
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLARFB, DLARFT, DORM2R, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX, MIN
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      LEFT = LSAME( SIDE, 'L' )
-      NOTRAN = LSAME( TRANS, 'N' )
-*
-*     NQ is the order of Q and NW is the minimum dimension of WORK
-*
-      IF( LEFT ) THEN
-         NQ = M
-         NW = N
-      ELSE
-         NQ = N
-         NW = M
-      END IF
-      IF( .NOT.LEFT .AND. .NOT.LSAME( SIDE, 'R' ) ) THEN
-         INFO = -1
-      ELSE IF( .NOT.NOTRAN .AND. .NOT.LSAME( TRANS, 'T' ) ) THEN
-         INFO = -2
-      ELSE IF( M.LT.0 ) THEN
-         INFO = -3
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -4
-      ELSE IF( K.LT.0 .OR. K.GT.NQ ) THEN
-         INFO = -5
-      ELSE IF( LDA.LT.MAX( 1, NQ ) ) THEN
-         INFO = -7
-      ELSE IF( LDC.LT.MAX( 1, M ) ) THEN
-         INFO = -10
-      ELSE IF( LWORK.LT.MAX( 1, NW ) ) THEN
-         INFO = -12
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DORMQR', -INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible
-*
-      IF( M.EQ.0 .OR. N.EQ.0 .OR. K.EQ.0 ) THEN
-         WORK( 1 ) = 1
-         RETURN
-      END IF
-*
-*     Determine the block size.  NB may be at most NBMAX, where NBMAX
-*     is used to define the local array T.
-*
-      NB = MIN( NBMAX, ILAENV( 1, 'DORMQR', SIDE // TRANS, M, N, K,
-     $     -1 ) )
-      NBMIN = 2
-      LDWORK = NW
-      IF( NB.GT.1 .AND. NB.LT.K ) THEN
-         IWS = NW*NB
-         IF( LWORK.LT.IWS ) THEN
-            NB = LWORK / LDWORK
-            NBMIN = MAX( 2, ILAENV( 2, 'DORMQR', SIDE // TRANS, M, N, K,
-     $              -1 ) )
-         END IF
-      ELSE
-         IWS = NW
-      END IF
-*
-      IF( NB.LT.NBMIN .OR. NB.GE.K ) THEN
-*
-*        Use unblocked code
-*
-         CALL DORM2R( SIDE, TRANS, M, N, K, A, LDA, TAU, C, LDC, WORK,
-     $                IINFO )
-      ELSE
-*
-*        Use blocked code
-*
-         IF( ( LEFT .AND. .NOT.NOTRAN ) .OR.
-     $       ( .NOT.LEFT .AND. NOTRAN ) ) THEN
-            I1 = 1
-            I2 = K
-            I3 = NB
-         ELSE
-            I1 = ( ( K-1 ) / NB )*NB + 1
-            I2 = 1
-            I3 = -NB
-         END IF
-*
-         IF( LEFT ) THEN
-            NI = N
-            JC = 1
-         ELSE
-            MI = M
-            IC = 1
-         END IF
-*
-         DO 10 I = I1, I2, I3
-            IB = MIN( NB, K-I+1 )
-*
-*           Form the triangular factor of the block reflector
-*           H = H(i) H(i+1) . . . H(i+ib-1)
-*
-            CALL DLARFT( 'Forward', 'Columnwise', NQ-I+1, IB, A( I, I ),
-     $                   LDA, TAU( I ), T, LDT )
-            IF( LEFT ) THEN
-*
-*              H or H' is applied to C(i:m,1:n)
-*
-               MI = M - I + 1
-               IC = I
-            ELSE
-*
-*              H or H' is applied to C(1:m,i:n)
-*
-               NI = N - I + 1
-               JC = I
-            END IF
-*
-*           Apply H or H'
-*
-            CALL DLARFB( SIDE, TRANS, 'Forward', 'Columnwise', MI, NI,
-     $                   IB, A( I, I ), LDA, T, LDT, C( IC, JC ), LDC,
-     $                   WORK, LDWORK )
-   10    CONTINUE
-      END IF
-      WORK( 1 ) = IWS
-      RETURN
-*
-*     End of DORMQR
-*
-      END
-      SUBROUTINE DGEQRF( M, N, A, LDA, TAU, WORK, LWORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     March 31, 1993
-*
-*     .. Scalar Arguments ..
-      INTEGER            INFO, LDA, LWORK, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), TAU( * ), WORK( LWORK )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEQRF computes a QR factorization of a real M-by-N matrix A:
-*  A = Q * R.
-*
-*  Arguments
-*  =========
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix A.  M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix A.  N >= 0.
-*
-*  A       (input/output) DOUBLE PRECISION array, dimension (LDA,N)
-*          On entry, the M-by-N matrix A.
-*          On exit, the elements on and above the diagonal of the array
-*          contain the min(M,N)-by-N upper trapezoidal matrix R (R is
-*          upper triangular if m >= n); the elements below the diagonal,
-*          with the array TAU, represent the orthogonal matrix Q as a
-*          product of min(m,n) elementary reflectors (see Further
-*          Details).
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.  LDA >= max(1,M).
-*
-*  TAU     (output) DOUBLE PRECISION array, dimension (min(M,N))
-*          The scalar factors of the elementary reflectors (see Further
-*          Details).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (LWORK)
-*          On exit, if INFO = 0, WORK(1) returns the optimal LWORK.
-*
-*  LWORK   (input) INTEGER
-*          The dimension of the array WORK.  LWORK >= max(1,N).
-*          For optimum performance LWORK >= N*NB, where NB is
-*          the optimal blocksize.
-*
-*  INFO    (output) INTEGER
-*          = 0:  successful exit
-*          < 0:  if INFO = -i, the i-th argument had an illegal value
-*
-*  Further Details
-*  ===============
-*
-*  The matrix Q is represented as a product of elementary reflectors
-*
-*     Q = H(1) H(2) . . . H(k), where k = min(m,n).
-*
-*  Each H(i) has the form
-*
-*     H(i) = I - tau * v * v'
-*
-*  where tau is a real scalar, and v is a real vector with
-*  v(1:i-1) = 0 and v(i) = 1; v(i+1:m) is stored on exit in A(i+1:m,i),
-*  and tau in TAU(i).
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      INTEGER            I, IB, IINFO, IWS, K, LDWORK, NB, NBMIN, NX
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEQR2, DLARFB, DLARFT, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX, MIN
-*     ..
-*     .. External Functions ..
-      INTEGER            ILAENV
-      EXTERNAL           ILAENV
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      IF( M.LT.0 ) THEN
-         INFO = -1
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -2
-      ELSE IF( LDA.LT.MAX( 1, M ) ) THEN
-         INFO = -4
-      ELSE IF( LWORK.LT.MAX( 1, N ) ) THEN
-         INFO = -7
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DGEQRF', -INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible
-*
-      K = MIN( M, N )
-      IF( K.EQ.0 ) THEN
-         WORK( 1 ) = 1
-         RETURN
-      END IF
-*
-*     Determine the block size.
-*
-      NB = ILAENV( 1, 'DGEQRF', ' ', M, N, -1, -1 )
-      NBMIN = 2
-      NX = 0
-      IWS = N
-      IF( NB.GT.1 .AND. NB.LT.K ) THEN
-*
-*        Determine when to cross over from blocked to unblocked code.
-*
-         NX = MAX( 0, ILAENV( 3, 'DGEQRF', ' ', M, N, -1, -1 ) )
-         IF( NX.LT.K ) THEN
-*
-*           Determine if workspace is large enough for blocked code.
-*
-            LDWORK = N
-            IWS = LDWORK*NB
-            IF( LWORK.LT.IWS ) THEN
-*
-*              Not enough workspace to use optimal NB:  reduce NB and
-*              determine the minimum value of NB.
-*
-               NB = LWORK / LDWORK
-               NBMIN = MAX( 2, ILAENV( 2, 'DGEQRF', ' ', M, N, -1,
-     $                 -1 ) )
-            END IF
-         END IF
-      END IF
-*
-      IF( NB.GE.NBMIN .AND. NB.LT.K .AND. NX.LT.K ) THEN
-*
-*        Use blocked code initially
-*
-         DO 10 I = 1, K - NX, NB
-            IB = MIN( K-I+1, NB )
-*
-*           Compute the QR factorization of the current block
-*           A(i:m,i:i+ib-1)
-*
-            CALL DGEQR2( M-I+1, IB, A( I, I ), LDA, TAU( I ), WORK,
-     $                   IINFO )
-            IF( I+IB.LE.N ) THEN
-*
-*              Form the triangular factor of the block reflector
-*              H = H(i) H(i+1) . . . H(i+ib-1)
-*
-               CALL DLARFT( 'Forward', 'Columnwise', M-I+1, IB,
-     $                      A( I, I ), LDA, TAU( I ), WORK, LDWORK )
-*
-*              Apply H' to A(i:m,i+ib:n) from the left
-*
-               CALL DLARFB( 'Left', 'Transpose', 'Forward',
-     $                      'Columnwise', M-I+1, N-I-IB+1, IB,
-     $                      A( I, I ), LDA, WORK, LDWORK, A( I, I+IB ),
-     $                      LDA, WORK( IB+1 ), LDWORK )
-            END IF
-   10    CONTINUE
-      ELSE
-         I = 1
-      END IF
-*
-*     Use unblocked code to factor the last or only block.
-*
-      IF( I.LE.K )
-     $   CALL DGEQR2( M-I+1, N-I+1, A( I, I ), LDA, TAU( I ), WORK,
-     $                IINFO )
-*
-      WORK( 1 ) = IWS
-      RETURN
-*
-*     End of DGEQRF
-*
-      END
-      integer function idamax(n,dx,incx)
-c
-c     finds the index of element having max. absolute value.
-c     jack dongarra, linpack, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double precision dx(1),dmax
-      integer i,incx,ix,n
-c
-      idamax = 0
-      if( n .lt. 1 ) return
-      idamax = 1
-      if(n.eq.1)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      dmax = dabs(dx(ix))
-      ix = ix + incx
-      do 10 i = 2,n
-         if(dabs(dx(ix)).le.dmax) go to 5
-         idamax = i
-         dmax = dabs(dx(ix))
-    5    ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-   20 dmax = dabs(dx(1))
-      do 30 i = 2,n
-         if(dabs(dx(i)).le.dmax) go to 30
-         idamax = i
-         dmax = dabs(dx(i))
-   30 continue
-      return
-      end
-      SUBROUTINE ZTRSV ( UPLO, TRANS, DIAG, N, A, LDA, X, INCX )
-*     .. Scalar Arguments ..
-      INTEGER            INCX, LDA, N
-      CHARACTER*1        DIAG, TRANS, UPLO
-*     .. Array Arguments ..
-      COMPLEX*16         A( LDA, * ), X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZTRSV  solves one of the systems of equations
-*
-*     A*x = b,   or   A'*x = b,   or   conjg( A' )*x = b,
-*
-*  where b and x are n element vectors and A is an n by n unit, or
-*  non-unit, upper or lower triangular matrix.
-*
-*  No test for singularity or near-singularity is included in this
-*  routine. Such tests must be performed before calling this routine.
-*
-*  Parameters
-*  ==========
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the equations to be solved as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   A*x = b.
-*
-*              TRANS = 'T' or 't'   A'*x = b.
-*
-*              TRANS = 'C' or 'c'   conjg( A' )*x = b.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit
-*           triangular as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the order of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  A      - COMPLEX*16       array of DIMENSION ( LDA, n ).
-*           Before entry with  UPLO = 'U' or 'u', the leading n by n
-*           upper triangular part of the array A must contain the upper
-*           triangular matrix and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry with UPLO = 'L' or 'l', the leading n by n
-*           lower triangular part of the array A must contain the lower
-*           triangular matrix and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u', the diagonal elements of
-*           A are not referenced either, but are assumed to be unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, n ).
-*           Unchanged on exit.
-*
-*  X      - COMPLEX*16       array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the n
-*           element right-hand side vector b. On exit, X is overwritten
-*           with the solution vector x.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      COMPLEX*16         ZERO
-      PARAMETER        ( ZERO = ( 0.0D+0, 0.0D+0 ) )
-*     .. Local Scalars ..
-      COMPLEX*16         TEMP
-      INTEGER            I, INFO, IX, J, JX, KX
-      LOGICAL            NOCONJ, NOUNIT
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG, MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( UPLO , 'U' ).AND.
-     $         .NOT.LSAME( UPLO , 'L' )      )THEN
-         INFO = 1
-      ELSE IF( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 2
-      ELSE IF( .NOT.LSAME( DIAG , 'U' ).AND.
-     $         .NOT.LSAME( DIAG , 'N' )      )THEN
-         INFO = 3
-      ELSE IF( N.LT.0 )THEN
-         INFO = 4
-      ELSE IF( LDA.LT.MAX( 1, N ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'ZTRSV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      NOCONJ = LSAME( TRANS, 'T' )
-      NOUNIT = LSAME( DIAG , 'N' )
-*
-*     Set up the start point in X if the increment is not unity. This
-*     will be  ( N - 1 )*INCX  too small for descending loops.
-*
-      IF( INCX.LE.0 )THEN
-         KX = 1 - ( N - 1 )*INCX
-      ELSE IF( INCX.NE.1 )THEN
-         KX = 1
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  x := inv( A )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 20, J = N, 1, -1
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 10, I = J - 1, 1, -1
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   10                CONTINUE
-                  END IF
-   20          CONTINUE
-            ELSE
-               JX = KX + ( N - 1 )*INCX
-               DO 40, J = N, 1, -1
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 30, I = J - 1, 1, -1
-                        IX      = IX      - INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   30                CONTINUE
-                  END IF
-                  JX = JX - INCX
-   40          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 60, J = 1, N
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 50, I = J + 1, N
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   50                CONTINUE
-                  END IF
-   60          CONTINUE
-            ELSE
-               JX = KX
-               DO 80, J = 1, N
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 70, I = J + 1, N
-                        IX      = IX      + INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   70                CONTINUE
-                  END IF
-                  JX = JX + INCX
-   80          CONTINUE
-            END IF
-         END IF
-      ELSE
-*
-*        Form  x := inv( A' )*x  or  x := inv( conjg( A' ) )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 110, J = 1, N
-                  TEMP = X( J )
-                  IF( NOCONJ )THEN
-                     DO 90, I = 1, J - 1
-                        TEMP = TEMP - A( I, J )*X( I )
-   90                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 100, I = 1, J - 1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( I )
-  100                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( J ) = TEMP
-  110          CONTINUE
-            ELSE
-               JX = KX
-               DO 140, J = 1, N
-                  IX   = KX
-                  TEMP = X( JX )
-                  IF( NOCONJ )THEN
-                     DO 120, I = 1, J - 1
-                        TEMP = TEMP - A( I, J )*X( IX )
-                        IX   = IX   + INCX
-  120                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 130, I = 1, J - 1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( IX )
-                        IX   = IX   + INCX
-  130                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( JX ) = TEMP
-                  JX      = JX   + INCX
-  140          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 170, J = N, 1, -1
-                  TEMP = X( J )
-                  IF( NOCONJ )THEN
-                     DO 150, I = N, J + 1, -1
-                        TEMP = TEMP - A( I, J )*X( I )
-  150                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 160, I = N, J + 1, -1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( I )
-  160                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( J ) = TEMP
-  170          CONTINUE
-            ELSE
-               KX = KX + ( N - 1 )*INCX
-               JX = KX
-               DO 200, J = N, 1, -1
-                  IX   = KX
-                  TEMP = X( JX )
-                  IF( NOCONJ )THEN
-                     DO 180, I = N, J + 1, -1
-                        TEMP = TEMP - A( I, J )*X( IX )
-                        IX   = IX   - INCX
-  180                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 190, I = N, J + 1, -1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( IX )
-                        IX   = IX   - INCX
-  190                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( JX ) = TEMP
-                  JX      = JX   - INCX
-  200          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of ZTRSV .
-*
-      END
-      SUBROUTINE ZLARFX( SIDE, M, N, V, TAU, C, LDC, WORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE
-      INTEGER            LDC, M, N
-      COMPLEX*16         TAU
-*     ..
-*     .. Array Arguments ..
-      COMPLEX*16         C( LDC, * ), V( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZLARFX applies a complex elementary reflector H to a complex m by n
-*  matrix C, from either the left or the right. H is represented in the
-*  form
-*
-*        H = I - tau * v * v'
-*
-*  where tau is a complex scalar and v is a complex vector.
-*
-*  If tau = 0, then H is taken to be the unit matrix
-*
-*  This version uses inline code if H has order < 11.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': form  H * C
-*          = 'R': form  C * H
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  V       (input) COMPLEX*16 array, dimension (M) if SIDE = 'L'
-*                                        or (N) if SIDE = 'R'
-*          The vector v in the representation of H.
-*
-*  TAU     (input) COMPLEX*16
-*          The value tau in the representation of H.
-*
-*  C       (input/output) COMPLEX*16 array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by the matrix H * C if SIDE = 'L',
-*          or C * H if SIDE = 'R'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDA >= max(1,M).
-*
-*  WORK    (workspace) COMPLEX*16 array, dimension (N) if SIDE = 'L'
-*                                            or (M) if SIDE = 'R'
-*          WORK is not referenced if H has order < 11.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      COMPLEX*16         ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D+0, ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J
-      COMPLEX*16         SUM, T1, T10, T2, T3, T4, T5, T6, T7, T8, T9,
-     $                   V1, V10, V2, V3, V4, V5, V6, V7, V8, V9
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           ZGEMV, ZGERC
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG
-*     ..
-*     .. Executable Statements ..
-*
-      IF( TAU.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*        Form  H * C, where H has order m.
-*
-         GO TO ( 10, 30, 50, 70, 90, 110, 130, 150,
-     $           170, 190 )M
-*
-*        Code for general M
-*
-*        w := C'*v
-*
-         CALL ZGEMV( 'Conjugate transpose', M, N, ONE, C, LDC, V, 1,
-     $               ZERO, WORK, 1 )
-*
-*        C := C - tau * v * w'
-*
-         CALL ZGERC( M, N, -TAU, V, 1, WORK, 1, C, LDC )
-         GO TO 410
-   10    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*DCONJG( V( 1 ) )
-         DO 20 J = 1, N
-            C( 1, J ) = T1*C( 1, J )
-   20    CONTINUE
-         GO TO 410
-   30    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         DO 40 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-   40    CONTINUE
-         GO TO 410
-   50    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         DO 60 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-   60    CONTINUE
-         GO TO 410
-   70    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         DO 80 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-   80    CONTINUE
-         GO TO 410
-   90    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         DO 100 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-  100    CONTINUE
-         GO TO 410
-  110    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         DO 120 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-  120    CONTINUE
-         GO TO 410
-  130    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         DO 140 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-  140    CONTINUE
-         GO TO 410
-  150    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         V8 = DCONJG( V( 8 ) )
-         T8 = TAU*DCONJG( V8 )
-         DO 160 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-  160    CONTINUE
-         GO TO 410
-  170    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         V8 = DCONJG( V( 8 ) )
-         T8 = TAU*DCONJG( V8 )
-         V9 = DCONJG( V( 9 ) )
-         T9 = TAU*DCONJG( V9 )
-         DO 180 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-  180    CONTINUE
-         GO TO 410
-  190    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         V8 = DCONJG( V( 8 ) )
-         T8 = TAU*DCONJG( V8 )
-         V9 = DCONJG( V( 9 ) )
-         T9 = TAU*DCONJG( V9 )
-         V10 = DCONJG( V( 10 ) )
-         T10 = TAU*DCONJG( V10 )
-         DO 200 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J ) +
-     $            V10*C( 10, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-            C( 10, J ) = C( 10, J ) - SUM*T10
-  200    CONTINUE
-         GO TO 410
-      ELSE
-*
-*        Form  C * H, where H has order n.
-*
-         GO TO ( 210, 230, 250, 270, 290, 310, 330, 350,
-     $           370, 390 )N
-*
-*        Code for general N
-*
-*        w := C * v
-*
-         CALL ZGEMV( 'No transpose', M, N, ONE, C, LDC, V, 1, ZERO,
-     $               WORK, 1 )
-*
-*        C := C - tau * w * v'
-*
-         CALL ZGERC( M, N, -TAU, WORK, 1, V, 1, C, LDC )
-         GO TO 410
-  210    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*DCONJG( V( 1 ) )
-         DO 220 J = 1, M
-            C( J, 1 ) = T1*C( J, 1 )
-  220    CONTINUE
-         GO TO 410
-  230    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         DO 240 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-  240    CONTINUE
-         GO TO 410
-  250    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         DO 260 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-  260    CONTINUE
-         GO TO 410
-  270    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         DO 280 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-  280    CONTINUE
-         GO TO 410
-  290    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         DO 300 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-  300    CONTINUE
-         GO TO 410
-  310    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         DO 320 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-  320    CONTINUE
-         GO TO 410
-  330    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         DO 340 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-  340    CONTINUE
-         GO TO 410
-  350    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         V8 = V( 8 )
-         T8 = TAU*DCONJG( V8 )
-         DO 360 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-  360    CONTINUE
-         GO TO 410
-  370    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         V8 = V( 8 )
-         T8 = TAU*DCONJG( V8 )
-         V9 = V( 9 )
-         T9 = TAU*DCONJG( V9 )
-         DO 380 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-  380    CONTINUE
-         GO TO 410
-  390    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         V8 = V( 8 )
-         T8 = TAU*DCONJG( V8 )
-         V9 = V( 9 )
-         T9 = TAU*DCONJG( V9 )
-         V10 = V( 10 )
-         T10 = TAU*DCONJG( V10 )
-         DO 400 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 ) +
-     $            V10*C( J, 10 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-            C( J, 10 ) = C( J, 10 ) - SUM*T10
-  400    CONTINUE
-         GO TO 410
-      END IF
-  410 CONTINUE
-      RETURN
-*
-*     End of ZLARFX
-*
-      END
-      SUBROUTINE ZLARFG( N, ALPHA, X, INCX, TAU )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            INCX, N
-      COMPLEX*16         ALPHA, TAU
-*     ..
-*     .. Array Arguments ..
-      COMPLEX*16         X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZLARFG generates a complex elementary reflector H of order n, such
-*  that
-*
-*        H' * ( alpha ) = ( beta ),   H' * H = I.
-*             (   x   )   (   0  )
-*
-*  where alpha and beta are scalars, with beta real, and x is an
-*  (n-1)-element complex vector. H is represented in the form
-*
-*        H = I - tau * ( 1 ) * ( 1 v' ) ,
-*                      ( v )
-*
-*  where tau is a complex scalar and v is a complex (n-1)-element
-*  vector. Note that H is not hermitian.
-*
-*  If the elements of x are all zero and alpha is real, then tau = 0
-*  and H is taken to be the unit matrix.
-*
-*  Otherwise  1 <= real(tau) <= 2  and  abs(tau-1) <= 1 .
-*
-*  Arguments
-*  =========
-*
-*  N       (input) INTEGER
-*          The order of the elementary reflector.
-*
-*  ALPHA   (input/output) COMPLEX*16
-*          On entry, the value alpha.
-*          On exit, it is overwritten with the value beta.
-*
-*  X       (input/output) COMPLEX*16 array, dimension
-*                         (1+(N-2)*abs(INCX))
-*          On entry, the vector x.
-*          On exit, it is overwritten with the vector v.
-*
-*  INCX    (input) INTEGER
-*          The increment between elements of X. INCX <> 0.
-*
-*  TAU     (output) COMPLEX*16
-*          The value tau.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J, KNT
-      DOUBLE PRECISION   ALPHI, ALPHR, BETA, RSAFMN, SAFMIN, XNORM
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMCH, DLAPY3, DZNRM2
-      COMPLEX*16         ZLADIV
-      EXTERNAL           DLAMCH, DLAPY3, DZNRM2, ZLADIV
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, DBLE, DCMPLX, DIMAG, SIGN
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           ZDSCAL, ZSCAL
-*     ..
-*     .. Executable Statements ..
-*
-      IF( N.LE.0 ) THEN
-         TAU = ZERO
-         RETURN
-      END IF
-*
-      XNORM = DZNRM2( N-1, X, INCX )
-      ALPHR = DBLE( ALPHA )
-      ALPHI = DIMAG( ALPHA )
-*
-      IF( XNORM.EQ.ZERO .AND. ALPHI.EQ.ZERO ) THEN
-*
-*        H  =  I
-*
-         TAU = ZERO
-      ELSE
-*
-*        general case
-*
-         BETA = -SIGN( DLAPY3( ALPHR, ALPHI, XNORM ), ALPHR )
-         SAFMIN = DLAMCH( 'S' )
-         RSAFMN = ONE / SAFMIN
-*
-         IF( ABS( BETA ).LT.SAFMIN ) THEN
-*
-*           XNORM, BETA may be inaccurate; scale X and recompute them
-*
-            KNT = 0
-   10       CONTINUE
-            KNT = KNT + 1
-            CALL ZDSCAL( N-1, RSAFMN, X, INCX )
-            BETA = BETA*RSAFMN
-            ALPHI = ALPHI*RSAFMN
-            ALPHR = ALPHR*RSAFMN
-            IF( ABS( BETA ).LT.SAFMIN )
-     $         GO TO 10
-*
-*           New BETA is at most 1, at least SAFMIN
-*
-            XNORM = DZNRM2( N-1, X, INCX )
-            ALPHA = DCMPLX( ALPHR, ALPHI )
-            BETA = -SIGN( DLAPY3( ALPHR, ALPHI, XNORM ), ALPHR )
-            TAU = DCMPLX( ( BETA-ALPHR ) / BETA, -ALPHI / BETA )
-            ALPHA = ZLADIV( DCMPLX( ONE ), ALPHA-BETA )
-            CALL ZSCAL( N-1, ALPHA, X, INCX )
-*
-*           If ALPHA is subnormal, it may lose relative accuracy
-*
-            ALPHA = BETA
-            DO 20 J = 1, KNT
-               ALPHA = ALPHA*SAFMIN
-   20       CONTINUE
-         ELSE
-            TAU = DCMPLX( ( BETA-ALPHR ) / BETA, -ALPHI / BETA )
-            ALPHA = ZLADIV( DCMPLX( ONE ), ALPHA-BETA )
-            CALL ZSCAL( N-1, ALPHA, X, INCX )
-            ALPHA = BETA
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of ZLARFG
-*
-      END
-      SUBROUTINE DGEQPF( M, N, A, LDA, JPVT, TAU, WORK, INFO )
-*
-*  -- LAPACK test routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     March 31, 1993
-*
-*     .. Scalar Arguments ..
-      INTEGER            INFO, LDA, M, N
-*     ..
-*     .. Array Arguments ..
-      INTEGER            JPVT( * )
-      DOUBLE PRECISION   A( LDA, * ), TAU( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEQPF computes a QR factorization with column pivoting of a
-*  real M-by-N matrix A: A*P = Q*R.
-*
-*  Arguments
-*  =========
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix A. M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix A. N >= 0
-*
-*  A       (input/output) DOUBLE PRECISION array, dimension (LDA,N)
-*          On entry, the M-by-N matrix A.
-*          On exit, the upper triangle of the array contains the
-*          min(M,N)-by-N upper triangular matrix R; the elements
-*          below the diagonal, together with the array TAU,
-*          represent the orthogonal matrix Q as a product of
-*          min(m,n) elementary reflectors.
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A. LDA >= max(1,M).
-*
-*  JPVT    (input/output) INTEGER array, dimension (N)
-*          On entry, if JPVT(i) .ne. 0, the i-th column of A is permuted
-*          to the front of A*P (a leading column); if JPVT(i) = 0,
-*          the i-th column of A is a free column.
-*          On exit, if JPVT(i) = k, then the i-th column of A*P
-*          was the k-th column of A.
-*
-*  TAU     (output) DOUBLE PRECISION array, dimension (min(M,N))
-*          The scalar factors of the elementary reflectors.
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (3*N)
-*
-*  INFO    (output) INTEGER
-*          = 0:  successful exit
-*          < 0:  if INFO = -i, the i-th argument had an illegal value
-*
-*  Further Details
-*  ===============
-*
-*  The matrix Q is represented as a product of elementary reflectors
-*
-*     Q = H(1) H(2) . . . H(n)
-*
-*  Each H(i) has the form
-*
-*     H = I - tau * v * v'
-*
-*  where tau is a real scalar, and v is a real vector with
-*  v(1:i-1) = 0 and v(i) = 1; v(i+1:m) is stored on exit in A(i+1:m,i).
-*
-*  The matrix P is represented in jpvt as follows: If
-*     jpvt(j) = i
-*  then the jth column of P is the ith canonical unit vector.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D+0, ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            I, ITEMP, J, MA, MN, PVT
-      DOUBLE PRECISION   AII, TEMP, TEMP2
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEQR2, DLARF, DLARFG, DORM2R, DSWAP, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, MIN, SQRT
-*     ..
-*     .. External Functions ..
-      INTEGER            IDAMAX
-      DOUBLE PRECISION   DNRM2
-      EXTERNAL           IDAMAX, DNRM2
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      IF( M.LT.0 ) THEN
-         INFO = -1
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -2
-      ELSE IF( LDA.LT.MAX( 1, M ) ) THEN
-         INFO = -4
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DGEQPF', -INFO )
-         RETURN
-      END IF
-*
-      MN = MIN( M, N )
-*
-*     Move initial columns up front
-*
-      ITEMP = 1
-      DO 10 I = 1, N
-         IF( JPVT( I ).NE.0 ) THEN
-            IF( I.NE.ITEMP ) THEN
-               CALL DSWAP( M, A( 1, I ), 1, A( 1, ITEMP ), 1 )
-               JPVT( I ) = JPVT( ITEMP )
-               JPVT( ITEMP ) = I
-            ELSE
-               JPVT( I ) = I
-            END IF
-            ITEMP = ITEMP + 1
-         ELSE
-            JPVT( I ) = I
-         END IF
-   10 CONTINUE
-      ITEMP = ITEMP - 1
-*
-*     Compute the QR factorization and update remaining columns
-*
-      IF( ITEMP.GT.0 ) THEN
-         MA = MIN( ITEMP, M )
-         CALL DGEQR2( M, MA, A, LDA, TAU, WORK, INFO )
-         IF( MA.LT.N ) THEN
-            CALL DORM2R( 'Left', 'Transpose', M, N-MA, MA, A, LDA, TAU,
-     $                   A( 1, MA+1 ), LDA, WORK, INFO )
-         END IF
-      END IF
-*
-      IF( ITEMP.LT.MN ) THEN
-*
-*        Initialize partial column norms. The first n entries of
-*        work store the exact column norms.
-*
-         DO 20 I = ITEMP + 1, N
-            WORK( I ) = DNRM2( M-ITEMP, A( ITEMP+1, I ), 1 )
-            WORK( N+I ) = WORK( I )
-   20    CONTINUE
-*
-*        Compute factorization
-*
-         DO 40 I = ITEMP + 1, MN
-*
-*           Determine ith pivot column and swap if necessary
-*
-            PVT = ( I-1 ) + IDAMAX( N-I+1, WORK( I ), 1 )
-*
-            IF( PVT.NE.I ) THEN
-               CALL DSWAP( M, A( 1, PVT ), 1, A( 1, I ), 1 )
-               ITEMP = JPVT( PVT )
-               JPVT( PVT ) = JPVT( I )
-               JPVT( I ) = ITEMP
-               WORK( PVT ) = WORK( I )
-               WORK( N+PVT ) = WORK( N+I )
-            END IF
-*
-*           Generate elementary reflector H(i)
-*
-            IF( I.LT.M ) THEN
-               CALL DLARFG( M-I+1, A( I, I ), A( I+1, I ), 1, TAU( I ) )
-            ELSE
-               CALL DLARFG( 1, A( M, M ), A( M, M ), 1, TAU( M ) )
-            END IF
-*
-            IF( I.LT.N ) THEN
-*
-*              Apply H(i) to A(i:m,i+1:n) from the left
-*
-               AII = A( I, I )
-               A( I, I ) = ONE
-               CALL DLARF( 'LEFT', M-I+1, N-I, A( I, I ), 1, TAU( I ),
-     $                     A( I, I+1 ), LDA, WORK( 2*N+1 ) )
-               A( I, I ) = AII
-            END IF
-*
-*           Update partial column norms
-*
-            DO 30 J = I + 1, N
-               IF( WORK( J ).NE.ZERO ) THEN
-                  TEMP = ONE - ( ABS( A( I, J ) ) / WORK( J ) )**2
-                  TEMP = MAX( TEMP, ZERO )
-                  TEMP2 = ONE + 0.05D0*TEMP*
-     $                    ( WORK( J ) / WORK( N+J ) )**2
-                  IF( TEMP2.EQ.ONE ) THEN
-                     IF( M-I.GT.0 ) THEN
-                        WORK( J ) = DNRM2( M-I, A( I+1, J ), 1 )
-                        WORK( N+J ) = WORK( J )
-                     ELSE
-                        WORK( J ) = ZERO
-                        WORK( N+J ) = ZERO
-                     END IF
-                  ELSE
-                     WORK( J ) = WORK( J )*SQRT( TEMP )
-                  END IF
-               END IF
-   30       CONTINUE
-*
-   40    CONTINUE
-      END IF
-      RETURN
-*
-*     End of DGEQPF
-*
-      END
-      double precision function dnrm2 ( n, dx, incx)
-      integer i, incx, ix, j, n, next
-      double precision   dx(1), cutlo, cuthi, hitest, sum, xmax,zero,one
-      data   zero, one /0.0d0, 1.0d0/
-c
-c     euclidean norm of the n-vector stored in dx() with storage
-c     increment incx .
-c     if    n .le. 0 return with result = 0.
-c     if n .ge. 1 then incx must be .ge. 1
-c
-c           c.l.lawson, 1978 jan 08
-c     modified to correct problem with negative increment, 8/21/90.
-c     modified to correct failure to update ix, 1/25/92.
-c
-c     four phase method     using two built-in constants that are
-c     hopefully applicable to all machines.
-c         cutlo = maximum of  dsqrt(u/eps)  over all known machines.
-c         cuthi = minimum of  dsqrt(v)      over all known machines.
-c     where
-c         eps = smallest no. such that eps + 1. .gt. 1.
-c         u   = smallest positive no.   (underflow limit)
-c         v   = largest  no.            (overflow  limit)
-c
-c     brief outline of algorithm..
-c
-c     phase 1    scans zero components.
-c     move to phase 2 when a component is nonzero and .le. cutlo
-c     move to phase 3 when a component is .gt. cutlo
-c     move to phase 4 when a component is .ge. cuthi/m
-c     where m = n for x() real and m = 2*n for complex.
-c
-c     values for cutlo and cuthi..
-c     from the environmental parameters listed in the imsl converter
-c     document the limiting values are as follows..
-c     cutlo, s.p.   u/eps = 2**(-102) for  honeywell.  close seconds are
-c                   univac and dec at 2**(-103)
-c                   thus cutlo = 2**(-51) = 4.44089e-16
-c     cuthi, s.p.   v = 2**127 for univac, honeywell, and dec.
-c                   thus cuthi = 2**(63.5) = 1.30438e19
-c     cutlo, d.p.   u/eps = 2**(-67) for honeywell and dec.
-c                   thus cutlo = 2**(-33.5) = 8.23181d-11
-c     cuthi, d.p.   same as s.p.  cuthi = 1.30438d19
-c     data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c     data cutlo, cuthi / 4.441e-16,  1.304e19 /
-      data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c
-      if(n .gt. 0) go to 10
-         dnrm2  = zero
-         go to 300
-c
-   10 assign 30 to next
-      sum = zero
-      i = 1
-      if( incx .lt. 0 )i = (-n+1)*incx + 1
-      ix = 1
-c                                                 begin main loop
-   20    go to next,(30, 50, 70, 110)
-   30 if( dabs(dx(i)) .gt. cutlo) go to 85
-      assign 50 to next
-      xmax = zero
-c
-c                        phase 1.  sum is zero
-c
-   50 if( dx(i) .eq. zero) go to 200
-      if( dabs(dx(i)) .gt. cutlo) go to 85
-c
-c                                prepare for phase 2.
-      assign 70 to next
-      go to 105
-c
-c                                prepare for phase 4.
-c
-  100 continue
-      ix = j
-      assign 110 to next
-      sum = (sum / dx(i)) / dx(i)
-  105 xmax = dabs(dx(i))
-      go to 115
-c
-c                   phase 2.  sum is small.
-c                             scale to avoid destructive underflow.
-c
-   70 if( dabs(dx(i)) .gt. cutlo ) go to 75
-c
-c                     common code for phases 2 and 4.
-c                     in phase 4 sum is large.  scale to avoid overflow.
-c
-  110 if( dabs(dx(i)) .le. xmax ) go to 115
-         sum = one + sum * (xmax / dx(i))**2
-         xmax = dabs(dx(i))
-         go to 200
-c
-  115 sum = sum + (dx(i)/xmax)**2
-      go to 200
-c
-c
-c                  prepare for phase 3.
-c
-   75 sum = (sum * xmax) * xmax
-c
-c
-c     for real or d.p. set hitest = cuthi/n
-c     for complex      set hitest = cuthi/(2*n)
-c
-   85 hitest = cuthi/float( n )
-c
-c                   phase 3.  sum is mid-range.  no scaling.
-c
-      do 95 j = ix,n
-      if(dabs(dx(i)) .ge. hitest) go to 100
-         sum = sum + dx(i)**2
-         i = i + incx
-   95 continue
-      dnrm2 = dsqrt( sum )
-      go to 300
-c
-  200 continue
-      ix = ix + 1
-      i = i + incx
-      if( ix .le. n ) go to 20
-c
-c              end of main loop.
-c
-c              compute square root and adjust for scaling.
-c
-      dnrm2 = xmax * dsqrt(sum)
-  300 continue
-      return
-      end
-      SUBROUTINE DLARFX( SIDE, M, N, V, TAU, C, LDC, WORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE
-      INTEGER            LDC, M, N
-      DOUBLE PRECISION   TAU
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   C( LDC, * ), V( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFX applies a real elementary reflector H to a real m by n
-*  matrix C, from either the left or the right. H is represented in the
-*  form
-*
-*        H = I - tau * v * v'
-*
-*  where tau is a real scalar and v is a real vector.
-*
-*  If tau = 0, then H is taken to be the unit matrix
-*
-*  This version uses inline code if H has order < 11.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': form  H * C
-*          = 'R': form  C * H
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  V       (input) DOUBLE PRECISION array, dimension (M) if SIDE = 'L'
-*                                     or (N) if SIDE = 'R'
-*          The vector v in the representation of H.
-*
-*  TAU     (input) DOUBLE PRECISION
-*          The value tau in the representation of H.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by the matrix H * C if SIDE = 'L',
-*          or C * H if SIDE = 'R'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDA >= (1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension
-*                      (N) if SIDE = 'L'
-*                      or (M) if SIDE = 'R'
-*          WORK is not referenced if H has order < 11.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D+0, ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J
-      DOUBLE PRECISION   SUM, T1, T10, T2, T3, T4, T5, T6, T7, T8, T9,
-     $                   V1, V10, V2, V3, V4, V5, V6, V7, V8, V9
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEMV, DGER
-*     ..
-*     .. Executable Statements ..
-*
-      IF( TAU.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*        Form  H * C, where H has order m.
-*
-         GO TO ( 10, 30, 50, 70, 90, 110, 130, 150,
-     $           170, 190 )M
-*
-*        Code for general M
-*
-*        w := C'*v
-*
-         CALL DGEMV( 'Transpose', M, N, ONE, C, LDC, V, 1, ZERO, WORK,
-     $               1 )
-*
-*        C := C - tau * v * w'
-*
-         CALL DGER( M, N, -TAU, V, 1, WORK, 1, C, LDC )
-         GO TO 410
-   10    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*V( 1 )
-         DO 20 J = 1, N
-            C( 1, J ) = T1*C( 1, J )
-   20    CONTINUE
-         GO TO 410
-   30    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         DO 40 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-   40    CONTINUE
-         GO TO 410
-   50    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         DO 60 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-   60    CONTINUE
-         GO TO 410
-   70    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         DO 80 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-   80    CONTINUE
-         GO TO 410
-   90    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         DO 100 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-  100    CONTINUE
-         GO TO 410
-  110    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         DO 120 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-  120    CONTINUE
-         GO TO 410
-  130    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         DO 140 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-  140    CONTINUE
-         GO TO 410
-  150    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         DO 160 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-  160    CONTINUE
-         GO TO 410
-  170    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         DO 180 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-  180    CONTINUE
-         GO TO 410
-  190    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         V10 = V( 10 )
-         T10 = TAU*V10
-         DO 200 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J ) +
-     $            V10*C( 10, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-            C( 10, J ) = C( 10, J ) - SUM*T10
-  200    CONTINUE
-         GO TO 410
-      ELSE
-*
-*        Form  C * H, where H has order n.
-*
-         GO TO ( 210, 230, 250, 270, 290, 310, 330, 350,
-     $           370, 390 )N
-*
-*        Code for general N
-*
-*        w := C * v
-*
-         CALL DGEMV( 'No transpose', M, N, ONE, C, LDC, V, 1, ZERO,
-     $               WORK, 1 )
-*
-*        C := C - tau * w * v'
-*
-         CALL DGER( M, N, -TAU, WORK, 1, V, 1, C, LDC )
-         GO TO 410
-  210    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*V( 1 )
-         DO 220 J = 1, M
-            C( J, 1 ) = T1*C( J, 1 )
-  220    CONTINUE
-         GO TO 410
-  230    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         DO 240 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-  240    CONTINUE
-         GO TO 410
-  250    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         DO 260 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-  260    CONTINUE
-         GO TO 410
-  270    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         DO 280 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-  280    CONTINUE
-         GO TO 410
-  290    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         DO 300 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-  300    CONTINUE
-         GO TO 410
-  310    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         DO 320 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-  320    CONTINUE
-         GO TO 410
-  330    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         DO 340 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-  340    CONTINUE
-         GO TO 410
-  350    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         DO 360 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-  360    CONTINUE
-         GO TO 410
-  370    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         DO 380 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-  380    CONTINUE
-         GO TO 410
-  390    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         V10 = V( 10 )
-         T10 = TAU*V10
-         DO 400 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 ) +
-     $            V10*C( J, 10 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-            C( J, 10 ) = C( J, 10 ) - SUM*T10
-  400    CONTINUE
-         GO TO 410
-      END IF
-  410 CONTINUE
-      RETURN
-*
-*     End of DLARFX
-*
-      END
-      SUBROUTINE DLARFG( N, ALPHA, X, INCX, TAU )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            INCX, N
-      DOUBLE PRECISION   ALPHA, TAU
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFG generates a real elementary reflector H of order n, such
-*  that
-*
-*        H * ( alpha ) = ( beta ),   H' * H = I.
-*            (   x   )   (   0  )
-*
-*  where alpha and beta are scalars, and x is an (n-1)-element real
-*  vector. H is represented in the form
-*
-*        H = I - tau * ( 1 ) * ( 1 v' ) ,
-*                      ( v )
-*
-*  where tau is a real scalar and v is a real (n-1)-element
-*  vector.
-*
-*  If the elements of x are all zero, then tau = 0 and H is taken to be
-*  the unit matrix.
-*
-*  Otherwise  1 <= tau <= 2.
-*
-*  Arguments
-*  =========
-*
-*  N       (input) INTEGER
-*          The order of the elementary reflector.
-*
-*  ALPHA   (input/output) DOUBLE PRECISION
-*          On entry, the value alpha.
-*          On exit, it is overwritten with the value beta.
-*
-*  X       (input/output) DOUBLE PRECISION array, dimension
-*                         (1+(N-2)*abs(INCX))
-*          On entry, the vector x.
-*          On exit, it is overwritten with the vector v.
-*
-*  INCX    (input) INTEGER
-*          The increment between elements of X. INCX <> 0.
-*
-*  TAU     (output) DOUBLE PRECISION
-*          The value tau.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J, KNT
-      DOUBLE PRECISION   BETA, RSAFMN, SAFMIN, XNORM
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMCH, DLAPY2, DNRM2
-      EXTERNAL           DLAMCH, DLAPY2, DNRM2
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, SIGN
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DSCAL
-*     ..
-*     .. Executable Statements ..
-*
-      IF( N.LE.1 ) THEN
-         TAU = ZERO
-         RETURN
-      END IF
-*
-      XNORM = DNRM2( N-1, X, INCX )
-*
-      IF( XNORM.EQ.ZERO ) THEN
-*
-*        H  =  I
-*
-         TAU = ZERO
-      ELSE
-*
-*        general case
-*
-         BETA = -SIGN( DLAPY2( ALPHA, XNORM ), ALPHA )
-         SAFMIN = DLAMCH( 'S' )
-         IF( ABS( BETA ).LT.SAFMIN ) THEN
-*
-*           XNORM, BETA may be inaccurate; scale X and recompute them
-*
-            RSAFMN = ONE / SAFMIN
-            KNT = 0
-   10       CONTINUE
-            KNT = KNT + 1
-            CALL DSCAL( N-1, RSAFMN, X, INCX )
-            BETA = BETA*RSAFMN
-            ALPHA = ALPHA*RSAFMN
-            IF( ABS( BETA ).LT.SAFMIN )
-     $         GO TO 10
-*
-*           New BETA is at most 1, at least SAFMIN
-*
-            XNORM = DNRM2( N-1, X, INCX )
-            BETA = -SIGN( DLAPY2( ALPHA, XNORM ), ALPHA )
-            TAU = ( BETA-ALPHA ) / BETA
-            CALL DSCAL( N-1, ONE / ( ALPHA-BETA ), X, INCX )
-*
-*           If ALPHA is subnormal, it may lose relative accuracy
-*
-            ALPHA = BETA
-            DO 20 J = 1, KNT
-               ALPHA = ALPHA*SAFMIN
-   20       CONTINUE
-         ELSE
-            TAU = ( BETA-ALPHA ) / BETA
-            CALL DSCAL( N-1, ONE / ( ALPHA-BETA ), X, INCX )
-            ALPHA = BETA
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DLARFG
-*
-      END
-      SUBROUTINE XERBLA ( SRNAME, INFO )
-*     ..    Scalar Arguments ..
-      INTEGER            INFO
-      CHARACTER*6        SRNAME
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  XERBLA  is an error handler for the Level 2 BLAS routines.
-*
-*  It is called by the Level 2 BLAS routines if an input parameter is
-*  invalid.
-*
-*  Installers should consider modifying the STOP statement in order to
-*  call system-specific exception-handling facilities.
-*
-*  Parameters
-*  ==========
-*
-*  SRNAME - CHARACTER*6.
-*           On entry, SRNAME specifies the name of the routine which
-*           called XERBLA.
-*
-*  INFO   - INTEGER.
-*           On entry, INFO specifies the position of the invalid
-*           parameter in the parameter-list of the calling routine.
-*
-*
-*  Auxiliary routine for Level 2 Blas.
-*
-*  Written on 20-July-1986.
-*
-*     .. Executable Statements ..
-*
-      WRITE (*,99999) SRNAME, INFO
-*
-      STOP
-*
-99999 FORMAT ( ' ** On entry to ', A6, ' parameter number ', I2,
-     $         ' had an illegal value' )
-*
-*     End of XERBLA.
-*
-      END
-      LOGICAL FUNCTION LSAME ( CA, CB )
-*     .. Scalar Arguments ..
-      CHARACTER*1            CA, CB
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  LSAME  tests if CA is the same letter as CB regardless of case.
-*  CB is assumed to be an upper case letter. LSAME returns .TRUE. if
-*  CA is either the same as CB or the equivalent lower case letter.
-*
-*  N.B. This version of the routine is only correct for ASCII code.
-*       Installers must modify the routine for other character-codes.
-*
-*       For EBCDIC systems the constant IOFF must be changed to -64.
-*       For CDC systems using 6-12 bit representations, the system-
-*       specific code in comments must be activated.
-*
-*  Parameters
-*  ==========
-*
-*  CA     - CHARACTER*1
-*  CB     - CHARACTER*1
-*           On entry, CA and CB specify characters to be compared.
-*           Unchanged on exit.
-*
-*
-*  Auxiliary routine for Level 2 Blas.
-*
-*  -- Written on 20-July-1986
-*     Richard Hanson, Sandia National Labs.
-*     Jeremy Du Croz, Nag Central Office.
-*
-*     .. Parameters ..
-      INTEGER                IOFF
-      PARAMETER            ( IOFF=32 )
-*     .. Intrinsic Functions ..
-      INTRINSIC              ICHAR
-*     .. Executable Statements ..
-*
-*     Test if the characters are equal
-*
-      LSAME = CA .EQ. CB
-*
-*     Now test for equivalence
-*
-      IF ( .NOT.LSAME ) THEN
-         LSAME = ICHAR(CA) - IOFF .EQ. ICHAR(CB)
-      END IF
-*
-      RETURN
-*
-*  The following comments contain code for CDC systems using 6-12 bit
-*  representations.
-*
-*     .. Parameters ..
-*     INTEGER                ICIRFX
-*     PARAMETER            ( ICIRFX=62 )
-*     .. Scalar Arguments ..
-*     CHARACTER*1            CB
-*     .. Array Arguments ..
-*     CHARACTER*1            CA(*)
-*     .. Local Scalars ..
-*     INTEGER                IVAL
-*     .. Intrinsic Functions ..
-*     INTRINSIC              ICHAR, CHAR
-*     .. Executable Statements ..
-*
-*     See if the first character in string CA equals string CB.
-*
-*     LSAME = CA(1) .EQ. CB .AND. CA(1) .NE. CHAR(ICIRFX)
-*
-*     IF (LSAME) RETURN
-*
-*     The characters are not identical. Now check them for equivalence.
-*     Look for the 'escape' character, circumflex, followed by the
-*     letter.
-*
-*     IVAL = ICHAR(CA(2))
-*     IF (IVAL.GE.ICHAR('A') .AND. IVAL.LE.ICHAR('Z')) THEN
-*        LSAME = CA(1) .EQ. CHAR(ICIRFX) .AND. CA(2) .EQ. CB
-*     END IF
-*
-*     RETURN
-*
-*     End of LSAME.
-*
-      END
-      SUBROUTINE ZGEMV ( TRANS, M, N, ALPHA, A, LDA, X, INCX,
-     $                   BETA, Y, INCY )
-*     .. Scalar Arguments ..
-      COMPLEX*16         ALPHA, BETA
-      INTEGER            INCX, INCY, LDA, M, N
-      CHARACTER*1        TRANS
-*     .. Array Arguments ..
-      COMPLEX*16         A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZGEMV  performs one of the matrix-vector operations
-*
-*     y := alpha*A*x + beta*y,   or   y := alpha*A'*x + beta*y,   or
-*
-*     y := alpha*conjg( A' )*x + beta*y,
-*
-*  where alpha and beta are scalars, x and y are vectors and A is an
-*  m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the operation to be performed as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   y := alpha*A*x + beta*y.
-*
-*              TRANS = 'T' or 't'   y := alpha*A'*x + beta*y.
-*
-*              TRANS = 'C' or 'c'   y := alpha*conjg( A' )*x + beta*y.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - COMPLEX*16      .
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  A      - COMPLEX*16       array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*  X      - COMPLEX*16       array of DIMENSION at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ) otherwise.
-*           Before entry, the incremented array X must contain the
-*           vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  BETA   - COMPLEX*16      .
-*           On entry, BETA specifies the scalar beta. When BETA is
-*           supplied as zero then Y need not be set on input.
-*           Unchanged on exit.
-*
-*  Y      - COMPLEX*16       array of DIMENSION at least
-*           ( 1 + ( m - 1 )*abs( INCY ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ) otherwise.
-*           Before entry with BETA non-zero, the incremented array Y
-*           must contain the vector y. On exit, Y is overwritten by the
-*           updated vector y.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      COMPLEX*16         ONE
-      PARAMETER        ( ONE  = ( 1.0D+0, 0.0D+0 ) )
-      COMPLEX*16         ZERO
-      PARAMETER        ( ZERO = ( 0.0D+0, 0.0D+0 ) )
-*     .. Local Scalars ..
-      COMPLEX*16         TEMP
-      INTEGER            I, INFO, IX, IY, J, JX, JY, KX, KY, LENX, LENY
-      LOGICAL            NOCONJ
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG, MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 1
-      ELSE IF( M.LT.0 )THEN
-         INFO = 2
-      ELSE IF( N.LT.0 )THEN
-         INFO = 3
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 11
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'ZGEMV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.
-     $    ( ( ALPHA.EQ.ZERO ).AND.( BETA.EQ.ONE ) ) )
-     $   RETURN
-*
-      NOCONJ = LSAME( TRANS, 'T' )
-*
-*     Set  LENX  and  LENY, the lengths of the vectors x and y, and set
-*     up the start points in  X  and  Y.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-         LENX = N
-         LENY = M
-      ELSE
-         LENX = M
-         LENY = N
-      END IF
-      IF( INCX.GT.0 )THEN
-         KX = 1
-      ELSE
-         KX = 1 - ( LENX - 1 )*INCX
-      END IF
-      IF( INCY.GT.0 )THEN
-         KY = 1
-      ELSE
-         KY = 1 - ( LENY - 1 )*INCY
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-*     First form  y := beta*y.
-*
-      IF( BETA.NE.ONE )THEN
-         IF( INCY.EQ.1 )THEN
-            IF( BETA.EQ.ZERO )THEN
-               DO 10, I = 1, LENY
-                  Y( I ) = ZERO
-   10          CONTINUE
-            ELSE
-               DO 20, I = 1, LENY
-                  Y( I ) = BETA*Y( I )
-   20          CONTINUE
-            END IF
-         ELSE
-            IY = KY
-            IF( BETA.EQ.ZERO )THEN
-               DO 30, I = 1, LENY
-                  Y( IY ) = ZERO
-                  IY      = IY   + INCY
-   30          CONTINUE
-            ELSE
-               DO 40, I = 1, LENY
-                  Y( IY ) = BETA*Y( IY )
-                  IY      = IY           + INCY
-   40          CONTINUE
-            END IF
-         END IF
-      END IF
-      IF( ALPHA.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  y := alpha*A*x + y.
-*
-         JX = KX
-         IF( INCY.EQ.1 )THEN
-            DO 60, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  DO 50, I = 1, M
-                     Y( I ) = Y( I ) + TEMP*A( I, J )
-   50             CONTINUE
-               END IF
-               JX = JX + INCX
-   60       CONTINUE
-         ELSE
-            DO 80, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  IY   = KY
-                  DO 70, I = 1, M
-                     Y( IY ) = Y( IY ) + TEMP*A( I, J )
-                     IY      = IY      + INCY
-   70             CONTINUE
-               END IF
-               JX = JX + INCX
-   80       CONTINUE
-         END IF
-      ELSE
-*
-*        Form  y := alpha*A'*x + y  or  y := alpha*conjg( A' )*x + y.
-*
-         JY = KY
-         IF( INCX.EQ.1 )THEN
-            DO 110, J = 1, N
-               TEMP = ZERO
-               IF( NOCONJ )THEN
-                  DO 90, I = 1, M
-                     TEMP = TEMP + A( I, J )*X( I )
-   90             CONTINUE
-               ELSE
-                  DO 100, I = 1, M
-                     TEMP = TEMP + DCONJG( A( I, J ) )*X( I )
-  100             CONTINUE
-               END IF
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  110       CONTINUE
-         ELSE
-            DO 140, J = 1, N
-               TEMP = ZERO
-               IX   = KX
-               IF( NOCONJ )THEN
-                  DO 120, I = 1, M
-                     TEMP = TEMP + A( I, J )*X( IX )
-                     IX   = IX   + INCX
-  120             CONTINUE
-               ELSE
-                  DO 130, I = 1, M
-                     TEMP = TEMP + DCONJG( A( I, J ) )*X( IX )
-                     IX   = IX   + INCX
-  130             CONTINUE
-               END IF
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  140       CONTINUE
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of ZGEMV .
-*
-      END
-      subroutine  zscal(n,za,zx,incx)
-c
-c     scales a vector by a constant.
-c     jack dongarra, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double complex za,zx(1)
-      integer i,incx,ix,n
-c
-      if(n.le.0)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      do 10 i = 1,n
-        zx(ix) = za*zx(ix)
-        ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-   20 do 30 i = 1,n
-        zx(i) = za*zx(i)
-   30 continue
-      return
-      end
-      subroutine  zdscal(n,da,zx,incx)
-c
-c     scales a vector by a constant.
-c     jack dongarra, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double complex zx(1)
-      double precision da
-      integer i,incx,ix,n
-c
-      if(n.le.0)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      do 10 i = 1,n
-        zx(ix) = dcmplx(da,0.0d0)*zx(ix)
-        ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-   20 do 30 i = 1,n
-        zx(i) = dcmplx(da,0.0d0)*zx(i)
-   30 continue
-      return
-      end
-      subroutine  dswap (n,dx,incx,dy,incy)
-c
-c     interchanges two vectors.
-c     uses unrolled loops for increments equal one.
-c     jack dongarra, linpack, 3/11/78.
-c
-      double precision dx(1),dy(1),dtemp
-      integer i,incx,incy,ix,iy,m,mp1,n
-c
-      if(n.le.0)return
-      if(incx.eq.1.and.incy.eq.1)go to 20
-c
-c       code for unequal increments or equal increments not equal
-c         to 1
-c
-      ix = 1
-      iy = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      if(incy.lt.0)iy = (-n+1)*incy + 1
-      do 10 i = 1,n
-        dtemp = dx(ix)
-        dx(ix) = dy(iy)
-        dy(iy) = dtemp
-        ix = ix + incx
-        iy = iy + incy
-   10 continue
-      return
-c
-c       code for both increments equal to 1
-c
-c
-c       clean-up loop
-c
-   20 m = mod(n,3)
-      if( m .eq. 0 ) go to 40
-      do 30 i = 1,m
-        dtemp = dx(i)
-        dx(i) = dy(i)
-        dy(i) = dtemp
-   30 continue
-      if( n .lt. 3 ) return
-   40 mp1 = m + 1
-      do 50 i = mp1,n,3
-        dtemp = dx(i)
-        dx(i) = dy(i)
-        dy(i) = dtemp
-        dtemp = dx(i + 1)
-        dx(i + 1) = dy(i + 1)
-        dy(i + 1) = dtemp
-        dtemp = dx(i + 2)
-        dx(i + 2) = dy(i + 2)
-        dy(i + 2) = dtemp
-   50 continue
-      return
-      end
-      SUBROUTINE DGER  ( M, N, ALPHA, X, INCX, Y, INCY, A, LDA )
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   ALPHA
-      INTEGER            INCX, INCY, LDA, M, N
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGER   performs the rank 1 operation
-*
-*     A := alpha*x*y' + A,
-*
-*  where alpha is a scalar, x is an m element vector, y is an n element
-*  vector and A is an m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the m
-*           element vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  Y      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ).
-*           Before entry, the incremented array Y must contain the n
-*           element vector y.
-*           Unchanged on exit.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients. On exit, A is
-*           overwritten by the updated matrix.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER        ( ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, J, JY, KX
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( M.LT.0 )THEN
-         INFO = 1
-      ELSE IF( N.LT.0 )THEN
-         INFO = 2
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 5
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 7
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 9
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DGER  ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.( ALPHA.EQ.ZERO ) )
-     $   RETURN
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( INCY.GT.0 )THEN
-         JY = 1
-      ELSE
-         JY = 1 - ( N - 1 )*INCY
-      END IF
-      IF( INCX.EQ.1 )THEN
-         DO 20, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*Y( JY )
-               DO 10, I = 1, M
-                  A( I, J ) = A( I, J ) + X( I )*TEMP
-   10          CONTINUE
-            END IF
-            JY = JY + INCY
-   20    CONTINUE
-      ELSE
-         IF( INCX.GT.0 )THEN
-            KX = 1
-         ELSE
-            KX = 1 - ( M - 1 )*INCX
-         END IF
-         DO 40, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*Y( JY )
-               IX   = KX
-               DO 30, I = 1, M
-                  A( I, J ) = A( I, J ) + X( IX )*TEMP
-                  IX        = IX        + INCX
-   30          CONTINUE
-            END IF
-            JY = JY + INCY
-   40    CONTINUE
-      END IF
-*
-      RETURN
-*
-*     End of DGER  .
-*
-      END
-      SUBROUTINE DGEMV ( TRANS, M, N, ALPHA, A, LDA, X, INCX,
-     $                   BETA, Y, INCY )
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   ALPHA, BETA
-      INTEGER            INCX, INCY, LDA, M, N
-      CHARACTER*1        TRANS
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEMV  performs one of the matrix-vector operations
-*
-*     y := alpha*A*x + beta*y,   or   y := alpha*A'*x + beta*y,
-*
-*  where alpha and beta are scalars, x and y are vectors and A is an
-*  m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the operation to be performed as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   y := alpha*A*x + beta*y.
-*
-*              TRANS = 'T' or 't'   y := alpha*A'*x + beta*y.
-*
-*              TRANS = 'C' or 'c'   y := alpha*A'*x + beta*y.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of DIMENSION at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ) otherwise.
-*           Before entry, the incremented array X must contain the
-*           vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  BETA   - DOUBLE PRECISION.
-*           On entry, BETA specifies the scalar beta. When BETA is
-*           supplied as zero then Y need not be set on input.
-*           Unchanged on exit.
-*
-*  Y      - DOUBLE PRECISION array of DIMENSION at least
-*           ( 1 + ( m - 1 )*abs( INCY ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ) otherwise.
-*           Before entry with BETA non-zero, the incremented array Y
-*           must contain the vector y. On exit, Y is overwritten by the
-*           updated vector y.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE         , ZERO
-      PARAMETER        ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, IY, J, JX, JY, KX, KY, LENX, LENY
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 1
-      ELSE IF( M.LT.0 )THEN
-         INFO = 2
-      ELSE IF( N.LT.0 )THEN
-         INFO = 3
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 11
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DGEMV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.
-     $    ( ( ALPHA.EQ.ZERO ).AND.( BETA.EQ.ONE ) ) )
-     $   RETURN
-*
-*     Set  LENX  and  LENY, the lengths of the vectors x and y, and set
-*     up the start points in  X  and  Y.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-         LENX = N
-         LENY = M
-      ELSE
-         LENX = M
-         LENY = N
-      END IF
-      IF( INCX.GT.0 )THEN
-         KX = 1
-      ELSE
-         KX = 1 - ( LENX - 1 )*INCX
-      END IF
-      IF( INCY.GT.0 )THEN
-         KY = 1
-      ELSE
-         KY = 1 - ( LENY - 1 )*INCY
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-*     First form  y := beta*y.
-*
-      IF( BETA.NE.ONE )THEN
-         IF( INCY.EQ.1 )THEN
-            IF( BETA.EQ.ZERO )THEN
-               DO 10, I = 1, LENY
-                  Y( I ) = ZERO
-   10          CONTINUE
-            ELSE
-               DO 20, I = 1, LENY
-                  Y( I ) = BETA*Y( I )
-   20          CONTINUE
-            END IF
-         ELSE
-            IY = KY
-            IF( BETA.EQ.ZERO )THEN
-               DO 30, I = 1, LENY
-                  Y( IY ) = ZERO
-                  IY      = IY   + INCY
-   30          CONTINUE
-            ELSE
-               DO 40, I = 1, LENY
-                  Y( IY ) = BETA*Y( IY )
-                  IY      = IY           + INCY
-   40          CONTINUE
-            END IF
-         END IF
-      END IF
-      IF( ALPHA.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  y := alpha*A*x + y.
-*
-         JX = KX
-         IF( INCY.EQ.1 )THEN
-            DO 60, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  DO 50, I = 1, M
-                     Y( I ) = Y( I ) + TEMP*A( I, J )
-   50             CONTINUE
-               END IF
-               JX = JX + INCX
-   60       CONTINUE
-         ELSE
-            DO 80, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  IY   = KY
-                  DO 70, I = 1, M
-                     Y( IY ) = Y( IY ) + TEMP*A( I, J )
-                     IY      = IY      + INCY
-   70             CONTINUE
-               END IF
-               JX = JX + INCX
-   80       CONTINUE
-         END IF
-      ELSE
-*
-*        Form  y := alpha*A'*x + y.
-*
-         JY = KY
-         IF( INCX.EQ.1 )THEN
-            DO 100, J = 1, N
-               TEMP = ZERO
-               DO 90, I = 1, M
-                  TEMP = TEMP + A( I, J )*X( I )
-   90          CONTINUE
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  100       CONTINUE
-         ELSE
-            DO 120, J = 1, N
-               TEMP = ZERO
-               IX   = KX
-               DO 110, I = 1, M
-                  TEMP = TEMP + A( I, J )*X( IX )
-                  IX   = IX   + INCX
-  110          CONTINUE
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  120       CONTINUE
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DGEMV .
-*
-      END
-      subroutine  dscal(n,da,dx,incx)
-c
-c     scales a vector by a constant.
-c     uses unrolled loops for increment equal to one.
-c     jack dongarra, linpack, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double precision da,dx(1)
-      integer i,incx,ix,m,mp1,n
-c
-      if(n.le.0)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      do 10 i = 1,n
-        dx(ix) = da*dx(ix)
-        ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-c
-c        clean-up loop
-c
-   20 m = mod(n,5)
-      if( m .eq. 0 ) go to 40
-      do 30 i = 1,m
-        dx(i) = da*dx(i)
-   30 continue
-      if( n .lt. 5 ) return
-   40 mp1 = m + 1
-      do 50 i = mp1,n,5
-        dx(i) = da*dx(i)
-        dx(i + 1) = da*dx(i + 1)
-        dx(i + 2) = da*dx(i + 2)
-        dx(i + 3) = da*dx(i + 3)
-        dx(i + 4) = da*dx(i + 4)
-   50 continue
-      return
-      end
-      SUBROUTINE DORM2R( SIDE, TRANS, M, N, K, A, LDA, TAU, C, LDC,
-     $                   WORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE, TRANS
-      INTEGER            INFO, K, LDA, LDC, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), C( LDC, * ), TAU( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DORM2R overwrites the general real m by n matrix C with
-*
-*        Q * C  if SIDE = 'L' and TRANS = 'N', or
-*
-*        Q'* C  if SIDE = 'L' and TRANS = 'T', or
-*
-*        C * Q  if SIDE = 'R' and TRANS = 'N', or
-*
-*        C * Q' if SIDE = 'R' and TRANS = 'T',
-*
-*  where Q is a real orthogonal matrix defined as the product of k
-*  elementary reflectors
-*
-*        Q = H(1) H(2) . . . H(k)
-*
-*  as returned by DGEQRF. Q is of order m if SIDE = 'L' and of order n
-*  if SIDE = 'R'.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': apply Q or Q' from the Left
-*          = 'R': apply Q or Q' from the Right
-*
-*  TRANS   (input) CHARACTER*1
-*          = 'N': apply Q  (No transpose)
-*          = 'T': apply Q' (Transpose)
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C. M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C. N >= 0.
-*
-*  K       (input) INTEGER
-*          The number of elementary reflectors whose product defines
-*          the matrix Q.
-*          If SIDE = 'L', M >= K >= 0;
-*          if SIDE = 'R', N >= K >= 0.
-*
-*  A       (input) DOUBLE PRECISION array, dimension (LDA,K)
-*          The i-th column must contain the vector which defines the
-*          elementary reflector H(i), for i = 1,2,...,k, as returned by
-*          DGEQRF in the first k columns of its array argument A.
-*          A is modified by the routine but restored on exit.
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.
-*          If SIDE = 'L', LDA >= max(1,M);
-*          if SIDE = 'R', LDA >= max(1,N).
-*
-*  TAU     (input) DOUBLE PRECISION array, dimension (K)
-*          TAU(i) must contain the scalar factor of the elementary
-*          reflector H(i), as returned by DGEQRF.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by Q*C or Q'*C or C*Q' or C*Q.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDC >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension
-*                                   (N) if SIDE = 'L',
-*                                   (M) if SIDE = 'R'
-*
-*  INFO    (output) INTEGER
-*          = 0: successful exit
-*          < 0: if INFO = -i, the i-th argument had an illegal value
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      LOGICAL            LEFT, NOTRAN
-      INTEGER            I, I1, I2, I3, IC, JC, MI, NI, NQ
-      DOUBLE PRECISION   AII
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLARF, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      LEFT = LSAME( SIDE, 'L' )
-      NOTRAN = LSAME( TRANS, 'N' )
-*
-*     NQ is the order of Q
-*
-      IF( LEFT ) THEN
-         NQ = M
-      ELSE
-         NQ = N
-      END IF
-      IF( .NOT.LEFT .AND. .NOT.LSAME( SIDE, 'R' ) ) THEN
-         INFO = -1
-      ELSE IF( .NOT.NOTRAN .AND. .NOT.LSAME( TRANS, 'T' ) ) THEN
-         INFO = -2
-      ELSE IF( M.LT.0 ) THEN
-         INFO = -3
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -4
-      ELSE IF( K.LT.0 .OR. K.GT.NQ ) THEN
-         INFO = -5
-      ELSE IF( LDA.LT.MAX( 1, NQ ) ) THEN
-         INFO = -7
-      ELSE IF( LDC.LT.MAX( 1, M ) ) THEN
-         INFO = -10
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DORM2R', -INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible
-*
-      IF( M.EQ.0 .OR. N.EQ.0 .OR. K.EQ.0 )
-     $   RETURN
-*
-      IF( ( LEFT .AND. .NOT.NOTRAN ) .OR. ( .NOT.LEFT .AND. NOTRAN ) )
-     $     THEN
-         I1 = 1
-         I2 = K
-         I3 = 1
-      ELSE
-         I1 = K
-         I2 = 1
-         I3 = -1
-      END IF
-*
-      IF( LEFT ) THEN
-         NI = N
-         JC = 1
-      ELSE
-         MI = M
-         IC = 1
-      END IF
-*
-      DO 10 I = I1, I2, I3
-         IF( LEFT ) THEN
-*
-*           H(i) is applied to C(i:m,1:n)
-*
-            MI = M - I + 1
-            IC = I
-         ELSE
-*
-*           H(i) is applied to C(1:m,i:n)
-*
-            NI = N - I + 1
-            JC = I
-         END IF
-*
-*        Apply H(i)
-*
-         AII = A( I, I )
-         A( I, I ) = ONE
-         CALL DLARF( SIDE, MI, NI, A( I, I ), 1, TAU( I ), C( IC, JC ),
-     $               LDC, WORK )
-         A( I, I ) = AII
-   10 CONTINUE
-      RETURN
-*
-*     End of DORM2R
-*
-      END
-      SUBROUTINE DLARFT( DIRECT, STOREV, N, K, V, LDV, TAU, T, LDT )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          DIRECT, STOREV
-      INTEGER            K, LDT, LDV, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   T( LDT, * ), TAU( * ), V( LDV, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFT forms the triangular factor T of a real block reflector H
-*  of order n, which is defined as a product of k elementary reflectors.
-*
-*  If DIRECT = 'F', H = H(1) H(2) . . . H(k) and T is upper triangular;
-*
-*  If DIRECT = 'B', H = H(k) . . . H(2) H(1) and T is lower triangular.
-*
-*  If STOREV = 'C', the vector which defines the elementary reflector
-*  H(i) is stored in the i-th column of the array V, and
-*
-*     H  =  I - V * T * V'
-*
-*  If STOREV = 'R', the vector which defines the elementary reflector
-*  H(i) is stored in the i-th row of the array V, and
-*
-*     H  =  I - V' * T * V
-*
-*  Arguments
-*  =========
-*
-*  DIRECT  (input) CHARACTER*1
-*          Specifies the order in which the elementary reflectors are
-*          multiplied to form the block reflector:
-*          = 'F': H = H(1) H(2) . . . H(k) (Forward)
-*          = 'B': H = H(k) . . . H(2) H(1) (Backward)
-*
-*  STOREV  (input) CHARACTER*1
-*          Specifies how the vectors which define the elementary
-*          reflectors are stored (see also Further Details):
-*          = 'C': columnwise
-*          = 'R': rowwise
-*
-*  N       (input) INTEGER
-*          The order of the block reflector H. N >= 0.
-*
-*  K       (input) INTEGER
-*          The order of the triangular factor T (= the number of
-*          elementary reflectors). K >= 1.
-*
-*  V       (input/output) DOUBLE PRECISION array, dimension
-*                               (LDV,K) if STOREV = 'C'
-*                               (LDV,N) if STOREV = 'R'
-*          The matrix V. See further details.
-*
-*  LDV     (input) INTEGER
-*          The leading dimension of the array V.
-*          If STOREV = 'C', LDV >= max(1,N); if STOREV = 'R', LDV >= K.
-*
-*  TAU     (input) DOUBLE PRECISION array, dimension (K)
-*          TAU(i) must contain the scalar factor of the elementary
-*          reflector H(i).
-*
-*  T       (output) DOUBLE PRECISION array, dimension (LDT,K)
-*          The k by k triangular factor T of the block reflector.
-*          If DIRECT = 'F', T is upper triangular; if DIRECT = 'B', T is
-*          lower triangular. The rest of the array is not used.
-*
-*  LDT     (input) INTEGER
-*          The leading dimension of the array T. LDT >= K.
-*
-*  Further Details
-*  ===============
-*
-*  The shape of the matrix V and the storage of the vectors which define
-*  the H(i) is best illustrated by the following example with n = 5 and
-*  k = 3. The elements equal to 1 are not stored; the corresponding
-*  array elements are modified but restored on exit. The rest of the
-*  array is not used.
-*
-*  DIRECT = 'F' and STOREV = 'C':         DIRECT = 'F' and STOREV = 'R':
-*
-*               V = (  1       )                 V = (  1 v1 v1 v1 v1 )
-*                   ( v1  1    )                     (     1 v2 v2 v2 )
-*                   ( v1 v2  1 )                     (        1 v3 v3 )
-*                   ( v1 v2 v3 )
-*                   ( v1 v2 v3 )
-*
-*  DIRECT = 'B' and STOREV = 'C':         DIRECT = 'B' and STOREV = 'R':
-*
-*               V = ( v1 v2 v3 )                 V = ( v1 v1  1       )
-*                   ( v1 v2 v3 )                     ( v2 v2 v2  1    )
-*                   (  1 v2 v3 )                     ( v3 v3 v3 v3  1 )
-*                   (     1 v3 )
-*                   (        1 )
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            I, J
-      DOUBLE PRECISION   VII
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEMV, DTRMV
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. Executable Statements ..
-*
-*     Quick return if possible
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      IF( LSAME( DIRECT, 'F' ) ) THEN
-         DO 20 I = 1, K
-            IF( TAU( I ).EQ.ZERO ) THEN
-*
-*              H(i)  =  I
-*
-               DO 10 J = 1, I
-                  T( J, I ) = ZERO
-   10          CONTINUE
-            ELSE
-*
-*              general case
-*
-               VII = V( I, I )
-               V( I, I ) = ONE
-               IF( LSAME( STOREV, 'C' ) ) THEN
-*
-*                 T(1:i-1,i) := - tau(i) * V(i:n,1:i-1)' * V(i:n,i)
-*
-                  CALL DGEMV( 'Transpose', N-I+1, I-1, -TAU( I ),
-     $                        V( I, 1 ), LDV, V( I, I ), 1, ZERO,
-     $                        T( 1, I ), 1 )
-               ELSE
-*
-*                 T(1:i-1,i) := - tau(i) * V(1:i-1,i:n) * V(i,i:n)'
-*
-                  CALL DGEMV( 'No transpose', I-1, N-I+1, -TAU( I ),
-     $                        V( 1, I ), LDV, V( I, I ), LDV, ZERO,
-     $                        T( 1, I ), 1 )
-               END IF
-               V( I, I ) = VII
-*
-*              T(1:i-1,i) := T(1:i-1,1:i-1) * T(1:i-1,i)
-*
-               CALL DTRMV( 'Upper', 'No transpose', 'Non-unit', I-1, T,
-     $                     LDT, T( 1, I ), 1 )
-               T( I, I ) = TAU( I )
-            END IF
-   20    CONTINUE
-      ELSE
-         DO 40 I = K, 1, -1
-            IF( TAU( I ).EQ.ZERO ) THEN
-*
-*              H(i)  =  I
-*
-               DO 30 J = I, K
-                  T( J, I ) = ZERO
-   30          CONTINUE
-            ELSE
-*
-*              general case
-*
-               IF( I.LT.K ) THEN
-                  IF( LSAME( STOREV, 'C' ) ) THEN
-                     VII = V( N-K+I, I )
-                     V( N-K+I, I ) = ONE
-*
-*                    T(i+1:k,i) :=
-*                            - tau(i) * V(1:n-k+i,i+1:k)' * V(1:n-k+i,i)
-*
-                     CALL DGEMV( 'Transpose', N-K+I, K-I, -TAU( I ),
-     $                           V( 1, I+1 ), LDV, V( 1, I ), 1, ZERO,
-     $                           T( I+1, I ), 1 )
-                     V( N-K+I, I ) = VII
-                  ELSE
-                     VII = V( I, N-K+I )
-                     V( I, N-K+I ) = ONE
-*
-*                    T(i+1:k,i) :=
-*                            - tau(i) * V(i+1:k,1:n-k+i) * V(i,1:n-k+i)'
-*
-                     CALL DGEMV( 'No transpose', K-I, N-K+I, -TAU( I ),
-     $                           V( I+1, 1 ), LDV, V( I, 1 ), LDV, ZERO,
-     $                           T( I+1, I ), 1 )
-                     V( I, N-K+I ) = VII
-                  END IF
-*
-*                 T(i+1:k,i) := T(i+1:k,i+1:k) * T(i+1:k,i)
-*
-                  CALL DTRMV( 'Lower', 'No transpose', 'Non-unit', K-I,
-     $                        T( I+1, I+1 ), LDT, T( I+1, I ), 1 )
-               END IF
-               T( I, I ) = TAU( I )
-            END IF
-   40    CONTINUE
-      END IF
-      RETURN
-*
-*     End of DLARFT
-*
-      END
-      SUBROUTINE DLARFB( SIDE, TRANS, DIRECT, STOREV, M, N, K, V, LDV,
-     $                   T, LDT, C, LDC, WORK, LDWORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          DIRECT, SIDE, STOREV, TRANS
-      INTEGER            K, LDC, LDT, LDV, LDWORK, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   C( LDC, * ), T( LDT, * ), V( LDV, * ),
-     $                   WORK( LDWORK, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFB applies a real block reflector H or its transpose H' to a
-*  real m by n matrix C, from either the left or the right.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': apply H or H' from the Left
-*          = 'R': apply H or H' from the Right
-*
-*  TRANS   (input) CHARACTER*1
-*          = 'N': apply H (No transpose)
-*          = 'T': apply H' (Transpose)
-*
-*  DIRECT  (input) CHARACTER*1
-*          Indicates how H is formed from a product of elementary
-*          reflectors
-*          = 'F': H = H(1) H(2) . . . H(k) (Forward)
-*          = 'B': H = H(k) . . . H(2) H(1) (Backward)
-*
-*  STOREV  (input) CHARACTER*1
-*          Indicates how the vectors which define the elementary
-*          reflectors are stored:
-*          = 'C': Columnwise
-*          = 'R': Rowwise
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  K       (input) INTEGER
-*          The order of the matrix T (= the number of elementary
-*          reflectors whose product defines the block reflector).
-*
-*  V       (input) DOUBLE PRECISION array, dimension
-*                                (LDV,K) if STOREV = 'C'
-*                                (LDV,M) if STOREV = 'R' and SIDE = 'L'
-*                                (LDV,N) if STOREV = 'R' and SIDE = 'R'
-*          The matrix V. See further details.
-*
-*  LDV     (input) INTEGER
-*          The leading dimension of the array V.
-*          If STOREV = 'C' and SIDE = 'L', LDV >= max(1,M);
-*          if STOREV = 'C' and SIDE = 'R', LDV >= max(1,N);
-*          if STOREV = 'R', LDV >= K.
-*
-*  T       (input) DOUBLE PRECISION array, dimension (LDT,K)
-*          The triangular k by k matrix T in the representation of the
-*          block reflector.
-*
-*  LDT     (input) INTEGER
-*          The leading dimension of the array T. LDT >= K.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by H*C or H'*C or C*H or C*H'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDA >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (LDWORK,K)
-*
-*  LDWORK  (input) INTEGER
-*          The leading dimension of the array WORK.
-*          If SIDE = 'L', LDWORK >= max(1,N);
-*          if SIDE = 'R', LDWORK >= max(1,M).
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      CHARACTER          TRANST
-      INTEGER            I, J
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DCOPY, DGEMM, DTRMM
-*     ..
-*     .. Executable Statements ..
-*
-*     Quick return if possible
-*
-      IF( M.LE.0 .OR. N.LE.0 )
-     $   RETURN
-*
-      IF( LSAME( TRANS, 'N' ) ) THEN
-         TRANST = 'T'
-      ELSE
-         TRANST = 'N'
-      END IF
-*
-      IF( LSAME( STOREV, 'C' ) ) THEN
-*
-         IF( LSAME( DIRECT, 'F' ) ) THEN
-*
-*           Let  V =  ( V1 )    (first K rows)
-*                     ( V2 )
-*           where  V1  is unit lower triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V  =  (C1'*V1 + C2'*V2)  (stored in WORK)
-*
-*              W := C1'
-*
-               DO 10 J = 1, K
-                  CALL DCOPY( N, C( J, 1 ), LDC, WORK( 1, J ), 1 )
-   10          CONTINUE
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', N,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C2'*V2
-*
-                  CALL DGEMM( 'Transpose', 'No transpose', N, K, M-K,
-     $                        ONE, C( K+1, 1 ), LDC, V( K+1, 1 ), LDV,
-     $                        ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Upper', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C2 := C2 - V2 * W'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M-K, N, K,
-     $                        -ONE, V( K+1, 1 ), LDV, WORK, LDWORK, ONE,
-     $                        C( K+1, 1 ), LDC )
-               END IF
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', N, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W'
-*
-               DO 30 J = 1, K
-                  DO 20 I = 1, N
-                     C( J, I ) = C( J, I ) - WORK( I, J )
-   20             CONTINUE
-   30          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V  =  (C1*V1 + C2*V2)  (stored in WORK)
-*
-*              W := C1
-*
-               DO 40 J = 1, K
-                  CALL DCOPY( M, C( 1, J ), 1, WORK( 1, J ), 1 )
-   40          CONTINUE
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', M,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C2 * V2
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, K, N-K,
-     $                        ONE, C( 1, K+1 ), LDC, V( K+1, 1 ), LDV,
-     $                        ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Upper', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V'
-*
-               IF( N.GT.K ) THEN
-*
-*                 C2 := C2 - W * V2'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V( K+1, 1 ), LDV, ONE,
-     $                        C( 1, K+1 ), LDC )
-               END IF
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', M, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W
-*
-               DO 60 J = 1, K
-                  DO 50 I = 1, M
-                     C( I, J ) = C( I, J ) - WORK( I, J )
-   50             CONTINUE
-   60          CONTINUE
-            END IF
-*
-         ELSE
-*
-*           Let  V =  ( V1 )
-*                     ( V2 )    (last K rows)
-*           where  V2  is unit upper triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V  =  (C1'*V1 + C2'*V2)  (stored in WORK)
-*
-*              W := C2'
-*
-               DO 70 J = 1, K
-                  CALL DCOPY( N, C( M-K+J, 1 ), LDC, WORK( 1, J ), 1 )
-   70          CONTINUE
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', N,
-     $                     K, ONE, V( M-K+1, 1 ), LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C1'*V1
-*
-                  CALL DGEMM( 'Transpose', 'No transpose', N, K, M-K,
-     $                        ONE, C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Lower', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C1 := C1 - V1 * W'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M-K, N, K,
-     $                        -ONE, V, LDV, WORK, LDWORK, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', N, K,
-     $                     ONE, V( M-K+1, 1 ), LDV, WORK, LDWORK )
-*
-*              C2 := C2 - W'
-*
-               DO 90 J = 1, K
-                  DO 80 I = 1, N
-                     C( M-K+J, I ) = C( M-K+J, I ) - WORK( I, J )
-   80             CONTINUE
-   90          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V  =  (C1*V1 + C2*V2)  (stored in WORK)
-*
-*              W := C2
-*
-               DO 100 J = 1, K
-                  CALL DCOPY( M, C( 1, N-K+J ), 1, WORK( 1, J ), 1 )
-  100          CONTINUE
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', M,
-     $                     K, ONE, V( N-K+1, 1 ), LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C1 * V1
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, K, N-K,
-     $                        ONE, C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Lower', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V'
-*
-               IF( N.GT.K ) THEN
-*
-*                 C1 := C1 - W * V1'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V, LDV, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', M, K,
-     $                     ONE, V( N-K+1, 1 ), LDV, WORK, LDWORK )
-*
-*              C2 := C2 - W
-*
-               DO 120 J = 1, K
-                  DO 110 I = 1, M
-                     C( I, N-K+J ) = C( I, N-K+J ) - WORK( I, J )
-  110             CONTINUE
-  120          CONTINUE
-            END IF
-         END IF
-*
-      ELSE IF( LSAME( STOREV, 'R' ) ) THEN
-*
-         IF( LSAME( DIRECT, 'F' ) ) THEN
-*
-*           Let  V =  ( V1  V2 )    (V1: first K columns)
-*           where  V1  is unit upper triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V'  =  (C1'*V1' + C2'*V2') (stored in WORK)
-*
-*              W := C1'
-*
-               DO 130 J = 1, K
-                  CALL DCOPY( N, C( J, 1 ), LDC, WORK( 1, J ), 1 )
-  130          CONTINUE
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', N, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C2'*V2'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', N, K, M-K, ONE,
-     $                        C( K+1, 1 ), LDC, V( 1, K+1 ), LDV, ONE,
-     $                        WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Upper', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V' * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C2 := C2 - V2' * W'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', M-K, N, K, -ONE,
-     $                        V( 1, K+1 ), LDV, WORK, LDWORK, ONE,
-     $                        C( K+1, 1 ), LDC )
-               END IF
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', N,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W'
-*
-               DO 150 J = 1, K
-                  DO 140 I = 1, N
-                     C( J, I ) = C( J, I ) - WORK( I, J )
-  140             CONTINUE
-  150          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V'  =  (C1*V1' + C2*V2')  (stored in WORK)
-*
-*              W := C1
-*
-               DO 160 J = 1, K
-                  CALL DCOPY( M, C( 1, J ), 1, WORK( 1, J ), 1 )
-  160          CONTINUE
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', M, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C2 * V2'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, K, N-K,
-     $                        ONE, C( 1, K+1 ), LDC, V( 1, K+1 ), LDV,
-     $                        ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Upper', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V
-*
-               IF( N.GT.K ) THEN
-*
-*                 C2 := C2 - W * V2
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V( 1, K+1 ), LDV, ONE,
-     $                        C( 1, K+1 ), LDC )
-               END IF
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', M,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W
-*
-               DO 180 J = 1, K
-                  DO 170 I = 1, M
-                     C( I, J ) = C( I, J ) - WORK( I, J )
-  170             CONTINUE
-  180          CONTINUE
-*
-            END IF
-*
-         ELSE
-*
-*           Let  V =  ( V1  V2 )    (V2: last K columns)
-*           where  V2  is unit lower triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V'  =  (C1'*V1' + C2'*V2') (stored in WORK)
-*
-*              W := C2'
-*
-               DO 190 J = 1, K
-                  CALL DCOPY( N, C( M-K+J, 1 ), LDC, WORK( 1, J ), 1 )
-  190          CONTINUE
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', N, K,
-     $                     ONE, V( 1, M-K+1 ), LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C1'*V1'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', N, K, M-K, ONE,
-     $                        C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Lower', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V' * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C1 := C1 - V1' * W'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', M-K, N, K, -ONE,
-     $                        V, LDV, WORK, LDWORK, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', N,
-     $                     K, ONE, V( 1, M-K+1 ), LDV, WORK, LDWORK )
-*
-*              C2 := C2 - W'
-*
-               DO 210 J = 1, K
-                  DO 200 I = 1, N
-                     C( M-K+J, I ) = C( M-K+J, I ) - WORK( I, J )
-  200             CONTINUE
-  210          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V'  =  (C1*V1' + C2*V2')  (stored in WORK)
-*
-*              W := C2
-*
-               DO 220 J = 1, K
-                  CALL DCOPY( M, C( 1, N-K+J ), 1, WORK( 1, J ), 1 )
-  220          CONTINUE
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', M, K,
-     $                     ONE, V( 1, N-K+1 ), LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C1 * V1'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, K, N-K,
-     $                        ONE, C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Lower', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V
-*
-               IF( N.GT.K ) THEN
-*
-*                 C1 := C1 - W * V1
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V, LDV, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', M,
-     $                     K, ONE, V( 1, N-K+1 ), LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W
-*
-               DO 240 J = 1, K
-                  DO 230 I = 1, M
-                     C( I, N-K+J ) = C( I, N-K+J ) - WORK( I, J )
-  230             CONTINUE
-  240          CONTINUE
-*
-            END IF
-*
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DLARFB
-*
-      END
-      INTEGER          FUNCTION ILAENV( ISPEC, NAME, OPTS, N1, N2, N3,
-     $                 N4 )
-*
-*  -- LAPACK auxiliary routine (preliminary version) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 20, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER*( * )    NAME, OPTS
-      INTEGER            ISPEC, N1, N2, N3, N4
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ILAENV is called from the LAPACK routines to choose problem-dependent
-*  parameters for the local environment.  See ISPEC for a description of
-*  the parameters.
-*
-*  This version provides a set of parameters which should give good,
-*  but not optimal, performance on many of the currently available
-*  computers.  Users are encouraged to modify this subroutine to set
-*  the tuning parameters for their particular machine using the option
-*  and problem size information in the arguments.
-*
-*  This routine will not function correctly if it is converted to all
-*  lower case.  Converting it to all upper case is allowed.
-*
-*  Arguments
-*  =========
-*
-*  ISPEC   (input) INTEGER
-*          Specifies the parameter to be returned as the value of
-*          ILAENV.
-*          = 1: the optimal blocksize; if this value is 1, an unblocked
-*               algorithm will give the best performance.
-*          = 2: the minimum block size for which the block routine
-*               should be used; if the usable block size is less than
-*               this value, an unblocked routine should be used.
-*          = 3: the crossover point (in a block routine, for N less
-*               than this value, an unblocked routine should be used)
-*          = 4: the number of shifts, used in the nonsymmetric
-*               eigenvalue routines
-*          = 5: the minimum column dimension for blocking to be used;
-*               rectangular blocks must have dimension at least k by m,
-*               where k is given by ILAENV(2,...) and m by ILAENV(5,...)
-*          = 6: the crossover point for the SVD (when reducing an m by n
-*               matrix to bidiagonal form, if max(m,n)/min(m,n) exceeds
-*               this value, a QR factorization is used first to reduce
-*               the matrix to a triangular form.)
-*          = 7: the number of processors
-*          = 8: the crossover point for the multishift QR and QZ methods
-*               for nonsymmetric eigenvalue problems.
-*
-*  NAME    (input) CHARACTER*(*)
-*          The name of the calling subroutine, in either upper case or
-*          lower case.
-*
-*  OPTS    (input) CHARACTER*(*)
-*          The character options to the subroutine NAME, concatenated
-*          into a single character string.  For example, UPLO = 'U',
-*          TRANS = 'T', and DIAG = 'N' for a triangular routine would
-*          be specified as OPTS = 'UTN'.
-*
-*  N1      (input) INTEGER
-*  N2      (input) INTEGER
-*  N3      (input) INTEGER
-*  N4      (input) INTEGER
-*          Problem dimensions for the subroutine NAME; these may not all
-*          be required.
-*
-* (ILAENV) (output) INTEGER
-*          >= 0: the value of the parameter specified by ISPEC
-*          < 0:  if ILAENV = -k, the k-th argument had an illegal value.
-*
-*  Further Details
-*  ===============
-*
-*  The following conventions have been used when calling ILAENV from the
-*  LAPACK routines:
-*  1)  OPTS is a concatenation of all of the character options to
-*      subroutine NAME, in the same order that they appear in the
-*      argument list for NAME, even if they are not used in determining
-*      the value of the parameter specified by ISPEC.
-*  2)  The problem dimensions N1, N2, N3, N4 are specified in the order
-*      that they appear in the argument list for NAME.  N1 is used
-*      first, N2 second, and so on, and unused problem dimensions are
-*      passed a value of -1.
-*  3)  The parameter value returned by ILAENV is checked for validity in
-*      the calling subroutine.  For example, ILAENV is used to retrieve
-*      the optimal blocksize for STRTRI as follows:
-*
-*      NB = ILAENV( 1, 'STRTRI', UPLO // DIAG, N, -1, -1, -1 )
-*      IF( NB.LE.1 ) NB = MAX( 1, N )
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      LOGICAL            CNAME, SNAME
-      CHARACTER*1        C1
-      CHARACTER*2        C2, C4
-      CHARACTER*3        C3
-      CHARACTER*6        SUBNAM
-      INTEGER            I, IC, IZ, NB, NBMIN, NX
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          CHAR, ICHAR, INT, MIN, REAL
-*     ..
-*     .. Executable Statements ..
-*
-      GO TO ( 100, 100, 100, 400, 500, 600, 700, 800 ) ISPEC
-*
-*     Invalid value for ISPEC
-*
-      ILAENV = -1
-      RETURN
-*
-  100 CONTINUE
-*
-*     Convert NAME to upper case if the first character is lower case.
-*
-      ILAENV = 1
-      SUBNAM = NAME
-      IC = ICHAR( SUBNAM( 1:1 ) )
-      IZ = ICHAR( 'Z' )
-      IF( IZ.EQ.90 .OR. IZ.EQ.122 ) THEN
-*
-*        ASCII character set
-*
-         IF( IC.GE.97 .AND. IC.LE.122 ) THEN
-            SUBNAM( 1:1 ) = CHAR( IC-32 )
-            DO 10 I = 2, 6
-               IC = ICHAR( SUBNAM( I:I ) )
-               IF( IC.GE.97 .AND. IC.LE.122 )
-     $            SUBNAM( I:I ) = CHAR( IC-32 )
-   10       CONTINUE
-         END IF
-*
-      ELSE IF( IZ.EQ.233 .OR. IZ.EQ.169 ) THEN
-*
-*        EBCDIC character set
-*
-         IF( ( IC.GE.129 .AND. IC.LE.137 ) .OR.
-     $       ( IC.GE.145 .AND. IC.LE.153 ) .OR.
-     $       ( IC.GE.162 .AND. IC.LE.169 ) ) THEN
-            SUBNAM( 1:1 ) = CHAR( IC+64 )
-            DO 20 I = 2, 6
-               IC = ICHAR( SUBNAM( I:I ) )
-               IF( ( IC.GE.129 .AND. IC.LE.137 ) .OR.
-     $             ( IC.GE.145 .AND. IC.LE.153 ) .OR.
-     $             ( IC.GE.162 .AND. IC.LE.169 ) )
-     $            SUBNAM( I:I ) = CHAR( IC+64 )
-   20       CONTINUE
-         END IF
-*
-      ELSE IF( IZ.EQ.218 .OR. IZ.EQ.250 ) THEN
-*
-*        Prime machines:  ASCII+128
-*
-         IF( IC.GE.225 .AND. IC.LE.250 ) THEN
-            SUBNAM( 1:1 ) = CHAR( IC-32 )
-            DO 30 I = 2, 6
-               IC = ICHAR( SUBNAM( I:I ) )
-               IF( IC.GE.225 .AND. IC.LE.250 )
-     $            SUBNAM( I:I ) = CHAR( IC-32 )
-   30       CONTINUE
-         END IF
-      END IF
-*
-      C1 = SUBNAM( 1:1 )
-      SNAME = C1.EQ.'S' .OR. C1.EQ.'D'
-      CNAME = C1.EQ.'C' .OR. C1.EQ.'Z'
-      IF( .NOT.( CNAME .OR. SNAME ) )
-     $   RETURN
-      C2 = SUBNAM( 2:3 )
-      C3 = SUBNAM( 4:6 )
-      C4 = C3( 2:3 )
-*
-      GO TO ( 110, 200, 300 ) ISPEC
-*
-  110 CONTINUE
-*
-*     ISPEC = 1:  block size
-*
-*     In these examples, separate code is provided for setting NB for
-*     real and complex.  We assume that NB will take the same value in
-*     single or double precision.
-*
-      NB = 1
-*
-      IF( C2.EQ.'GE' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         ELSE IF( C3.EQ.'QRF' .OR. C3.EQ.'RQF' .OR. C3.EQ.'LQF' .OR.
-     $            C3.EQ.'QLF' ) THEN
-            IF( SNAME ) THEN
-               NB = 32
-            ELSE
-               NB = 32
-            END IF
-         ELSE IF( C3.EQ.'HRD' ) THEN
-            IF( SNAME ) THEN
-               NB = 32
-            ELSE
-               NB = 32
-            END IF
-         ELSE IF( C3.EQ.'BRD' ) THEN
-            IF( SNAME ) THEN
-               NB = 32
-            ELSE
-               NB = 32
-            END IF
-         ELSE IF( C3.EQ.'TRI' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'PO' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'SY' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         ELSE IF( SNAME .AND. C3.EQ.'TRD' ) THEN
-            NB = 1
-         ELSE IF( SNAME .AND. C3.EQ.'GST' ) THEN
-            NB = 64
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'HE' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            NB = 64
-         ELSE IF( C3.EQ.'TRD' ) THEN
-            NB = 1
-         ELSE IF( C3.EQ.'GST' ) THEN
-            NB = 64
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'OR' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'UN' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'GB' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               IF( N4.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            ELSE
-               IF( N4.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'PB' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               IF( N2.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            ELSE
-               IF( N2.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'TR' ) THEN
-         IF( C3.EQ.'TRI' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'LA' ) THEN
-         IF( C3.EQ.'UUM' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'ST' ) THEN
-         IF( C3.EQ.'EBZ' ) THEN
-            NB = 1
-         END IF
-      END IF
-      ILAENV = NB
-      RETURN
-*
-  200 CONTINUE
-*
-*     ISPEC = 2:  minimum block size
-*
-      NBMIN = 2
-      IF( C2.EQ.'GE' ) THEN
-         IF( C3.EQ.'QRF' .OR. C3.EQ.'RQF' .OR. C3.EQ.'LQF' .OR.
-     $       C3.EQ.'QLF' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( C3.EQ.'HRD' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( C3.EQ.'BRD' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( C3.EQ.'TRI' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'SY' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( SNAME .AND. C3.EQ.'TRD' ) THEN
-            NBMIN = 2
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'HE' ) THEN
-         IF( C3.EQ.'TRD' ) THEN
-            NBMIN = 2
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'OR' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'UN' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         END IF
-      END IF
-      ILAENV = NBMIN
-      RETURN
-*
-  300 CONTINUE
-*
-*     ISPEC = 3:  crossover point
-*
-      NX = 0
-      IF( C2.EQ.'GE' ) THEN
-         IF( C3.EQ.'QRF' .OR. C3.EQ.'RQF' .OR. C3.EQ.'LQF' .OR.
-     $       C3.EQ.'QLF' ) THEN
-            IF( SNAME ) THEN
-               NX = 128
-            ELSE
-               NX = 128
-            END IF
-         ELSE IF( C3.EQ.'HRD' ) THEN
-            IF( SNAME ) THEN
-               NX = 128
-            ELSE
-               NX = 128
-            END IF
-         ELSE IF( C3.EQ.'BRD' ) THEN
-            IF( SNAME ) THEN
-               NX = 128
-            ELSE
-               NX = 128
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'SY' ) THEN
-         IF( SNAME .AND. C3.EQ.'TRD' ) THEN
-            NX = 1
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'HE' ) THEN
-         IF( C3.EQ.'TRD' ) THEN
-            NX = 1
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'OR' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NX = 128
-            END IF
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'UN' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NX = 128
-            END IF
-         END IF
-      END IF
-      ILAENV = NX
-      RETURN
-*
-  400 CONTINUE
-*
-*     ISPEC = 4:  number of shifts (used by xHSEQR)
-*
-      ILAENV = 6
-      RETURN
-*
-  500 CONTINUE
-*
-*     ISPEC = 5:  minimum column dimension (not used)
-*
-      ILAENV = 2
-      RETURN
-*
-  600 CONTINUE 
-*
-*     ISPEC = 6:  crossover point for SVD (used by xGELSS and xGESVD)
-*
-      ILAENV = INT( REAL( MIN( N1, N2 ) )*1.6E0 )
-      RETURN
-*
-  700 CONTINUE
-*
-*     ISPEC = 7:  number of processors (not used)
-*
-      ILAENV = 1
-      RETURN
-*
-  800 CONTINUE
-*
-*     ISPEC = 8:  crossover point for multishift (used by xHSEQR)
-*
-      ILAENV = 50
-      RETURN
-*
-*     End of ILAENV
-*
-      END
-      SUBROUTINE DGEQR2( M, N, A, LDA, TAU, WORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            INFO, LDA, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), TAU( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEQR2 computes a QR factorization of a real m by n matrix A:
-*  A = Q * R.
-*
-*  Arguments
-*  =========
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix A.  M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix A.  N >= 0.
-*
-*  A       (input/output) DOUBLE PRECISION array, dimension (LDA,N)
-*          On entry, the m by n matrix A.
-*          On exit, the elements on and above the diagonal of the array
-*          contain the min(m,n) by n upper trapezoidal matrix R (R is
-*          upper triangular if m >= n); the elements below the diagonal,
-*          with the array TAU, represent the orthogonal matrix Q as a
-*          product of elementary reflectors (see Further Details).
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.  LDA >= max(1,M).
-*
-*  TAU     (output) DOUBLE PRECISION array, dimension (min(M,N))
-*          The scalar factors of the elementary reflectors (see Further
-*          Details).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (N)
-*
-*  INFO    (output) INTEGER
-*          = 0: successful exit
-*          < 0: if INFO = -i, the i-th argument had an illegal value
-*
-*  Further Details
-*  ===============
-*
-*  The matrix Q is represented as a product of elementary reflectors
-*
-*     Q = H(1) H(2) . . . H(k), where k = min(m,n).
-*
-*  Each H(i) has the form
-*
-*     H(i) = I - tau * v * v'
-*
-*  where tau is a real scalar, and v is a real vector with
-*  v(1:i-1) = 0 and v(i) = 1; v(i+1:m) is stored on exit in A(i+1:m,i),
-*  and tau in TAU(i).
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            I, K
-      DOUBLE PRECISION   AII
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLARF, DLARFG, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX, MIN
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      IF( M.LT.0 ) THEN
-         INFO = -1
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -2
-      ELSE IF( LDA.LT.MAX( 1, M ) ) THEN
-         INFO = -4
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DGEQR2', -INFO )
-         RETURN
-      END IF
-*
-      K = MIN( M, N )
-*
-      DO 10 I = 1, K
-*
-*        Generate elementary reflector H(i) to annihilate A(i+1:m,i)
-*
-         CALL DLARFG( M-I+1, A( I, I ), A( MIN( I+1, M ), I ), 1,
-     $                TAU( I ) )
-         IF( I.LT.N ) THEN
-*
-*           Apply H(i) to A(i:m,i+1:n) from the left
-*
-            AII = A( I, I )
-            A( I, I ) = ONE
-            CALL DLARF( 'Left', M-I+1, N-I, A( I, I ), 1, TAU( I ),
-     $                  A( I, I+1 ), LDA, WORK )
-            A( I, I ) = AII
-         END IF
-   10 CONTINUE
-      RETURN
-*
-*     End of DGEQR2
-*
-      END
-      DOUBLE COMPLEX   FUNCTION ZLADIV( X, Y )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      COMPLEX*16         X, Y
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZLADIV := X / Y, where X and Y are complex.  The computation of X / Y
-*  will not overflow on an intermediary step unless the results
-*  overflows.
-*
-*  Arguments
-*  =========
-*
-*  X       (input) COMPLEX*16
-*  Y       (input) COMPLEX*16
-*          The complex scalars X and Y.
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      DOUBLE PRECISION   ZI, ZR
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLADIV
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          DBLE, DCMPLX, DIMAG
-*     ..
-*     .. Executable Statements ..
-*
-      CALL DLADIV( DBLE( X ), DIMAG( X ), DBLE( Y ), DIMAG( Y ), ZR,
-     $             ZI )
-      ZLADIV = DCMPLX( ZR, ZI )
-*
-      RETURN
-*
-*     End of ZLADIV
-*
-      END
-      DOUBLE PRECISION FUNCTION DLAPY3( X, Y, Z )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   X, Y, Z
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAPY3 returns sqrt(x**2+y**2+z**2), taking care not to cause
-*  unnecessary overflow.
-*
-*  Arguments
-*  =========
-*
-*  X       (input) DOUBLE PRECISION
-*  Y       (input) DOUBLE PRECISION
-*  Z       (input) DOUBLE PRECISION
-*          X, Y and Z specify the values x, y and z.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER          ( ZERO = 0.0D0 )
-*     ..
-*     .. Local Scalars ..
-      DOUBLE PRECISION   W, XABS, YABS, ZABS
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, SQRT
-*     ..
-*     .. Executable Statements ..
-*
-      XABS = ABS( X )
-      YABS = ABS( Y )
-      ZABS = ABS( Z )
-      W = MAX( XABS, YABS, ZABS )
-      IF( W.EQ.ZERO ) THEN
-         DLAPY3 = ZERO
-      ELSE
-         DLAPY3 = W*SQRT( ( XABS / W )**2+( YABS / W )**2+
-     $            ( ZABS / W )**2 )
-      END IF
-      RETURN
-*
-*     End of DLAPY3
-*
-      END
-      DOUBLE PRECISION FUNCTION DLAMCH( CMACH )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          CMACH
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMCH determines double precision machine parameters.
-*
-*  Arguments
-*  =========
-*
-*  CMACH   (input) CHARACTER*1
-*          Specifies the value to be returned by DLAMCH:
-*          = 'E' or 'e',   DLAMCH := eps
-*          = 'S' or 's ,   DLAMCH := sfmin
-*          = 'B' or 'b',   DLAMCH := base
-*          = 'P' or 'p',   DLAMCH := eps*base
-*          = 'N' or 'n',   DLAMCH := t
-*          = 'R' or 'r',   DLAMCH := rnd
-*          = 'M' or 'm',   DLAMCH := emin
-*          = 'U' or 'u',   DLAMCH := rmin
-*          = 'L' or 'l',   DLAMCH := emax
-*          = 'O' or 'o',   DLAMCH := rmax
-*
-*          where
-*
-*          eps   = relative machine precision
-*          sfmin = safe minimum, such that 1/sfmin does not overflow
-*          base  = base of the machine
-*          prec  = eps*base
-*          t     = number of (base) digits in the mantissa
-*          rnd   = 1.0 when rounding occurs in addition, 0.0 otherwise
-*          emin  = minimum exponent before (gradual) underflow
-*          rmin  = underflow threshold - base**(emin-1)
-*          emax  = largest exponent before overflow
-*          rmax  = overflow threshold  - (base**emax)*(1-eps)
-*
-* =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      LOGICAL            FIRST, LRND
-      INTEGER            BETA, IMAX, IMIN, IT
-      DOUBLE PRECISION   BASE, EMAX, EMIN, EPS, PREC, RMACH, RMAX, RMIN,
-     $                   RND, SFMIN, SMALL, T
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLAMC2
-*     ..
-*     .. Save statement ..
-      SAVE               FIRST, EPS, SFMIN, BASE, T, RND, EMIN, RMIN,
-     $                   EMAX, RMAX, PREC
-*     ..
-*     .. Data statements ..
-      DATA               FIRST / .TRUE. /
-*     ..
-*     .. Executable Statements ..
-*
-      IF( FIRST ) THEN
-         FIRST = .FALSE.
-         CALL DLAMC2( BETA, IT, LRND, EPS, IMIN, RMIN, IMAX, RMAX )
-         BASE = BETA
-         T = IT
-         IF( LRND ) THEN
-            RND = ONE
-            EPS = ( BASE**( 1-IT ) ) / 2
-         ELSE
-            RND = ZERO
-            EPS = BASE**( 1-IT )
-         END IF
-         PREC = EPS*BASE
-         EMIN = IMIN
-         EMAX = IMAX
-         SFMIN = RMIN
-         SMALL = ONE / RMAX
-         IF( SMALL.GE.SFMIN ) THEN
-*
-*           Use SMALL plus a bit, to avoid the possibility of rounding
-*           causing overflow when computing  1/sfmin.
-*
-            SFMIN = SMALL*( ONE+EPS )
-         END IF
-      END IF
-*
-      IF( LSAME( CMACH, 'E' ) ) THEN
-         RMACH = EPS
-      ELSE IF( LSAME( CMACH, 'S' ) ) THEN
-         RMACH = SFMIN
-      ELSE IF( LSAME( CMACH, 'B' ) ) THEN
-         RMACH = BASE
-      ELSE IF( LSAME( CMACH, 'P' ) ) THEN
-         RMACH = PREC
-      ELSE IF( LSAME( CMACH, 'N' ) ) THEN
-         RMACH = T
-      ELSE IF( LSAME( CMACH, 'R' ) ) THEN
-         RMACH = RND
-      ELSE IF( LSAME( CMACH, 'M' ) ) THEN
-         RMACH = EMIN
-      ELSE IF( LSAME( CMACH, 'U' ) ) THEN
-         RMACH = RMIN
-      ELSE IF( LSAME( CMACH, 'L' ) ) THEN
-         RMACH = EMAX
-      ELSE IF( LSAME( CMACH, 'O' ) ) THEN
-         RMACH = RMAX
-      END IF
-*
-      DLAMCH = RMACH
-      RETURN
-*
-*     End of DLAMCH
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC1( BETA, T, RND, IEEE1 )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      LOGICAL            IEEE1, RND
-      INTEGER            BETA, T
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC1 determines the machine parameters given by BETA, T, RND, and
-*  IEEE1.
-*
-*  Arguments
-*  =========
-*
-*  BETA    (output) INTEGER
-*          The base of the machine.
-*
-*  T       (output) INTEGER
-*          The number of ( BETA ) digits in the mantissa.
-*
-*  RND     (output) LOGICAL
-*          Specifies whether proper rounding  ( RND = .TRUE. )  or
-*          chopping  ( RND = .FALSE. )  occurs in addition. This may not
-*          be a reliable guide to the way in which the machine performs
-*          its arithmetic.
-*
-*  IEEE1   (output) LOGICAL
-*          Specifies whether rounding appears to be done in the IEEE
-*          'round to nearest' style.
-*
-*  Further Details
-*  ===============
-*
-*  The routine is based on the routine  ENVRON  by Malcolm and
-*  incorporates suggestions by Gentleman and Marovich. See
-*
-*     Malcolm M. A. (1972) Algorithms to reveal properties of
-*        floating-point arithmetic. Comms. of the ACM, 15, 949-951.
-*
-*     Gentleman W. M. and Marovich S. B. (1974) More on algorithms
-*        that reveal properties of floating point arithmetic units.
-*        Comms. of the ACM, 17, 276-277.
-*
-* =====================================================================
-*
-*     .. Local Scalars ..
-      LOGICAL            FIRST, LIEEE1, LRND
-      INTEGER            LBETA, LT
-      DOUBLE PRECISION   A, B, C, F, ONE, QTR, SAVEC, T1, T2
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. Save statement ..
-      SAVE               FIRST, LIEEE1, LBETA, LRND, LT
-*     ..
-*     .. Data statements ..
-      DATA               FIRST / .TRUE. /
-*     ..
-*     .. Executable Statements ..
-*
-      IF( FIRST ) THEN
-         FIRST = .FALSE.
-         ONE = 1
-*
-*        LBETA,  LIEEE1,  LT and  LRND  are the  local values  of  BETA,
-*        IEEE1, T and RND.
-*
-*        Throughout this routine  we use the function  DLAMC3  to ensure
-*        that relevant values are  stored and not held in registers,  or
-*        are not affected by optimizers.
-*
-*        Compute  a = 2.0**m  with the  smallest positive integer m such
-*        that
-*
-*           fl( a + 1.0 ) = a.
-*
-         A = 1
-         C = 1
-*
-*+       WHILE( C.EQ.ONE )LOOP
-   10    CONTINUE
-         IF( C.EQ.ONE ) THEN
-            A = 2*A
-            C = DLAMC3( A, ONE )
-            C = DLAMC3( C, -A )
-            GO TO 10
-         END IF
-*+       END WHILE
-*
-*        Now compute  b = 2.0**m  with the smallest positive integer m
-*        such that
-*
-*           fl( a + b ) .gt. a.
-*
-         B = 1
-         C = DLAMC3( A, B )
-*
-*+       WHILE( C.EQ.A )LOOP
-   20    CONTINUE
-         IF( C.EQ.A ) THEN
-            B = 2*B
-            C = DLAMC3( A, B )
-            GO TO 20
-         END IF
-*+       END WHILE
-*
-*        Now compute the base.  a and c  are neighbouring floating point
-*        numbers  in the  interval  ( beta**t, beta**( t + 1 ) )  and so
-*        their difference is beta. Adding 0.25 to c is to ensure that it
-*        is truncated to beta and not ( beta - 1 ).
-*
-         QTR = ONE / 4
-         SAVEC = C
-         C = DLAMC3( C, -A )
-         LBETA = C + QTR
-*
-*        Now determine whether rounding or chopping occurs,  by adding a
-*        bit  less  than  beta/2  and a  bit  more  than  beta/2  to  a.
-*
-         B = LBETA
-         F = DLAMC3( B / 2, -B / 100 )
-         C = DLAMC3( F, A )
-         IF( C.EQ.A ) THEN
-            LRND = .TRUE.
-         ELSE
-            LRND = .FALSE.
-         END IF
-         F = DLAMC3( B / 2, B / 100 )
-         C = DLAMC3( F, A )
-         IF( ( LRND ) .AND. ( C.EQ.A ) )
-     $      LRND = .FALSE.
-*
-*        Try and decide whether rounding is done in the  IEEE  'round to
-*        nearest' style. B/2 is half a unit in the last place of the two
-*        numbers A and SAVEC. Furthermore, A is even, i.e. has last  bit
-*        zero, and SAVEC is odd. Thus adding B/2 to A should not  change
-*        A, but adding B/2 to SAVEC should change SAVEC.
-*
-         T1 = DLAMC3( B / 2, A )
-         T2 = DLAMC3( B / 2, SAVEC )
-         LIEEE1 = ( T1.EQ.A ) .AND. ( T2.GT.SAVEC ) .AND. LRND
-*
-*        Now find  the  mantissa, t.  It should  be the  integer part of
-*        log to the base beta of a,  however it is safer to determine  t
-*        by powering.  So we find t as the smallest positive integer for
-*        which
-*
-*           fl( beta**t + 1.0 ) = 1.0.
-*
-         LT = 0
-         A = 1
-         C = 1
-*
-*+       WHILE( C.EQ.ONE )LOOP
-   30    CONTINUE
-         IF( C.EQ.ONE ) THEN
-            LT = LT + 1
-            A = A*LBETA
-            C = DLAMC3( A, ONE )
-            C = DLAMC3( C, -A )
-            GO TO 30
-         END IF
-*+       END WHILE
-*
-      END IF
-*
-      BETA = LBETA
-      T = LT
-      RND = LRND
-      IEEE1 = LIEEE1
-      RETURN
-*
-*     End of DLAMC1
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC2( BETA, T, RND, EPS, EMIN, RMIN, EMAX, RMAX )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      LOGICAL            RND
-      INTEGER            BETA, EMAX, EMIN, T
-      DOUBLE PRECISION   EPS, RMAX, RMIN
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC2 determines the machine parameters specified in its argument
-*  list.
-*
-*  Arguments
-*  =========
-*
-*  BETA    (output) INTEGER
-*          The base of the machine.
-*
-*  T       (output) INTEGER
-*          The number of ( BETA ) digits in the mantissa.
-*
-*  RND     (output) LOGICAL
-*          Specifies whether proper rounding  ( RND = .TRUE. )  or
-*          chopping  ( RND = .FALSE. )  occurs in addition. This may not
-*          be a reliable guide to the way in which the machine performs
-*          its arithmetic.
-*
-*  EPS     (output) DOUBLE PRECISION
-*          The smallest positive number such that
-*
-*             fl( 1.0 - EPS ) .LT. 1.0,
-*
-*          where fl denotes the computed value.
-*
-*  EMIN    (output) INTEGER
-*          The minimum exponent before (gradual) underflow occurs.
-*
-*  RMIN    (output) DOUBLE PRECISION
-*          The smallest normalized number for the machine, given by
-*          BASE**( EMIN - 1 ), where  BASE  is the floating point value
-*          of BETA.
-*
-*  EMAX    (output) INTEGER
-*          The maximum exponent before overflow occurs.
-*
-*  RMAX    (output) DOUBLE PRECISION
-*          The largest positive number for the machine, given by
-*          BASE**EMAX * ( 1 - EPS ), where  BASE  is the floating point
-*          value of BETA.
-*
-*  Further Details
-*  ===============
-*
-*  The computation of  EPS  is based on a routine PARANOIA by
-*  W. Kahan of the University of California at Berkeley.
-*
-* =====================================================================
-*
-*     .. Local Scalars ..
-      LOGICAL            FIRST, IEEE, IWARN, LIEEE1, LRND
-      INTEGER            GNMIN, GPMIN, I, LBETA, LEMAX, LEMIN, LT,
-     $                   NGNMIN, NGPMIN
-      DOUBLE PRECISION   A, B, C, HALF, LEPS, LRMAX, LRMIN, ONE, RBASE,
-     $                   SIXTH, SMALL, THIRD, TWO, ZERO
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLAMC1, DLAMC4, DLAMC5
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, MIN
-*     ..
-*     .. Save statement ..
-      SAVE               FIRST, IWARN, LBETA, LEMAX, LEMIN, LEPS, LRMAX,
-     $                   LRMIN, LT
-*     ..
-*     .. Data statements ..
-      DATA               FIRST / .TRUE. / , IWARN / .FALSE. /
-*     ..
-*     .. Executable Statements ..
-*
-      IF( FIRST ) THEN
-         FIRST = .FALSE.
-         ZERO = 0
-         ONE = 1
-         TWO = 2
-*
-*        LBETA, LT, LRND, LEPS, LEMIN and LRMIN  are the local values of
-*        BETA, T, RND, EPS, EMIN and RMIN.
-*
-*        Throughout this routine  we use the function  DLAMC3  to ensure
-*        that relevant values are stored  and not held in registers,  or
-*        are not affected by optimizers.
-*
-*        DLAMC1 returns the parameters  LBETA, LT, LRND and LIEEE1.
-*
-         CALL DLAMC1( LBETA, LT, LRND, LIEEE1 )
-*
-*        Start to find EPS.
-*
-         B = LBETA
-         A = B**( -LT )
-         LEPS = A
-*
-*        Try some tricks to see whether or not this is the correct  EPS.
-*
-         B = TWO / 3
-         HALF = ONE / 2
-         SIXTH = DLAMC3( B, -HALF )
-         THIRD = DLAMC3( SIXTH, SIXTH )
-         B = DLAMC3( THIRD, -HALF )
-         B = DLAMC3( B, SIXTH )
-         B = ABS( B )
-         IF( B.LT.LEPS )
-     $      B = LEPS
-*
-         LEPS = 1
-*
-*+       WHILE( ( LEPS.GT.B ).AND.( B.GT.ZERO ) )LOOP
-   10    CONTINUE
-         IF( ( LEPS.GT.B ) .AND. ( B.GT.ZERO ) ) THEN
-            LEPS = B
-            C = DLAMC3( HALF*LEPS, ( TWO**5 )*( LEPS**2 ) )
-            C = DLAMC3( HALF, -C )
-            B = DLAMC3( HALF, C )
-            C = DLAMC3( HALF, -B )
-            B = DLAMC3( HALF, C )
-            GO TO 10
-         END IF
-*+       END WHILE
-*
-         IF( A.LT.LEPS )
-     $      LEPS = A
-*
-*        Computation of EPS complete.
-*
-*        Now find  EMIN.  Let A = + or - 1, and + or - (1 + BASE**(-3)).
-*        Keep dividing  A by BETA until (gradual) underflow occurs. This
-*        is detected when we cannot recover the previous A.
-*
-         RBASE = ONE / LBETA
-         SMALL = ONE
-         DO 20 I = 1, 3
-            SMALL = DLAMC3( SMALL*RBASE, ZERO )
-   20    CONTINUE
-         A = DLAMC3( ONE, SMALL )
-         CALL DLAMC4( NGPMIN, ONE, LBETA )
-         CALL DLAMC4( NGNMIN, -ONE, LBETA )
-         CALL DLAMC4( GPMIN, A, LBETA )
-         CALL DLAMC4( GNMIN, -A, LBETA )
-         IEEE = .FALSE.
-*
-         IF( ( NGPMIN.EQ.NGNMIN ) .AND. ( GPMIN.EQ.GNMIN ) ) THEN
-            IF( NGPMIN.EQ.GPMIN ) THEN
-               LEMIN = NGPMIN
-*            ( Non twos-complement machines, no gradual underflow;
-*              e.g.,  VAX )
-            ELSE IF( ( GPMIN-NGPMIN ).EQ.3 ) THEN
-               LEMIN = NGPMIN - 1 + LT
-               IEEE = .TRUE.
-*            ( Non twos-complement machines, with gradual underflow;
-*              e.g., IEEE standard followers )
-            ELSE
-               LEMIN = MIN( NGPMIN, GPMIN )
-*            ( A guess; no known machine )
-               IWARN = .TRUE.
-            END IF
-*
-         ELSE IF( ( NGPMIN.EQ.GPMIN ) .AND. ( NGNMIN.EQ.GNMIN ) ) THEN
-            IF( ABS( NGPMIN-NGNMIN ).EQ.1 ) THEN
-               LEMIN = MAX( NGPMIN, NGNMIN )
-*            ( Twos-complement machines, no gradual underflow;
-*              e.g., CYBER 205 )
-            ELSE
-               LEMIN = MIN( NGPMIN, NGNMIN )
-*            ( A guess; no known machine )
-               IWARN = .TRUE.
-            END IF
-*
-         ELSE IF( ( ABS( NGPMIN-NGNMIN ).EQ.1 ) .AND.
-     $            ( GPMIN.EQ.GNMIN ) ) THEN
-            IF( ( GPMIN-MIN( NGPMIN, NGNMIN ) ).EQ.3 ) THEN
-               LEMIN = MAX( NGPMIN, NGNMIN ) - 1 + LT
-*            ( Twos-complement machines with gradual underflow;
-*              no known machine )
-            ELSE
-               LEMIN = MIN( NGPMIN, NGNMIN )
-*            ( A guess; no known machine )
-               IWARN = .TRUE.
-            END IF
-*
-         ELSE
-            LEMIN = MIN( NGPMIN, NGNMIN, GPMIN, GNMIN )
-*         ( A guess; no known machine )
-            IWARN = .TRUE.
-         END IF
-***
-* Comment out this if block if EMIN is ok
-         IF( IWARN ) THEN
-            FIRST = .TRUE.
-            WRITE( 6, FMT = 9999 )LEMIN
-         END IF
-***
-*
-*        Assume IEEE arithmetic if we found denormalised  numbers above,
-*        or if arithmetic seems to round in the  IEEE style,  determined
-*        in routine DLAMC1. A true IEEE machine should have both  things
-*        true; however, faulty machines may have one or the other.
-*
-         IEEE = IEEE .OR. LIEEE1
-*
-*        Compute  RMIN by successive division by  BETA. We could compute
-*        RMIN as BASE**( EMIN - 1 ),  but some machines underflow during
-*        this computation.
-*
-         LRMIN = 1
-         DO 30 I = 1, 1 - LEMIN
-            LRMIN = DLAMC3( LRMIN*RBASE, ZERO )
-   30    CONTINUE
-*
-*        Finally, call DLAMC5 to compute EMAX and RMAX.
-*
-         CALL DLAMC5( LBETA, LT, LEMIN, IEEE, LEMAX, LRMAX )
-      END IF
-*
-      BETA = LBETA
-      T = LT
-      RND = LRND
-      EPS = LEPS
-      EMIN = LEMIN
-      RMIN = LRMIN
-      EMAX = LEMAX
-      RMAX = LRMAX
-*
-      RETURN
-*
- 9999 FORMAT( / / ' WARNING. The value EMIN may be incorrect:-',
-     $      '  EMIN = ', I8, /
-     $      ' If, after inspection, the value EMIN looks',
-     $      ' acceptable please comment out ',
-     $      / ' the IF block as marked within the code of routine',
-     $      ' DLAMC2,', / ' otherwise supply EMIN explicitly.', / )
-*
-*     End of DLAMC2
-*
-      END
-*
-************************************************************************
-*
-      DOUBLE PRECISION FUNCTION DLAMC3( A, B )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   A, B
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC3  is intended to force  A  and  B  to be stored prior to doing
-*  the addition of  A  and  B ,  for use in situations where optimizers
-*  might hold one of these in a register.
-*
-*  Arguments
-*  =========
-*
-*  A, B    (input) DOUBLE PRECISION
-*          The values A and B.
-*
-* =====================================================================
-*
-*     .. Executable Statements ..
-*
-      DLAMC3 = A + B
-*
-      RETURN
-*
-*     End of DLAMC3
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC4( EMIN, START, BASE )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            BASE, EMIN
-      DOUBLE PRECISION   START
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC4 is a service routine for DLAMC2.
-*
-*  Arguments
-*  =========
-*
-*  EMIN    (output) EMIN
-*          The minimum exponent before (gradual) underflow, computed by
-*          setting A = START and dividing by BASE until the previous A
-*          can not be recovered.
-*
-*  START   (input) DOUBLE PRECISION
-*          The starting point for determining EMIN.
-*
-*  BASE    (input) INTEGER
-*          The base of the machine.
-*
-* =====================================================================
-*
-*     .. Local Scalars ..
-      INTEGER            I
-      DOUBLE PRECISION   A, B1, B2, C1, C2, D1, D2, ONE, RBASE, ZERO
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. Executable Statements ..
-*
-      A = START
-      ONE = 1
-      RBASE = ONE / BASE
-      ZERO = 0
-      EMIN = 1
-      B1 = DLAMC3( A*RBASE, ZERO )
-      C1 = A
-      C2 = A
-      D1 = A
-      D2 = A
-*+    WHILE( ( C1.EQ.A ).AND.( C2.EQ.A ).AND.
-*    $       ( D1.EQ.A ).AND.( D2.EQ.A )      )LOOP
-   10 CONTINUE
-      IF( ( C1.EQ.A ) .AND. ( C2.EQ.A ) .AND. ( D1.EQ.A ) .AND.
-     $    ( D2.EQ.A ) ) THEN
-         EMIN = EMIN - 1
-         A = B1
-         B1 = DLAMC3( A / BASE, ZERO )
-         C1 = DLAMC3( B1*BASE, ZERO )
-         D1 = ZERO
-         DO 20 I = 1, BASE
-            D1 = D1 + B1
-   20    CONTINUE
-         B2 = DLAMC3( A*RBASE, ZERO )
-         C2 = DLAMC3( B2 / RBASE, ZERO )
-         D2 = ZERO
-         DO 30 I = 1, BASE
-            D2 = D2 + B2
-   30    CONTINUE
-         GO TO 10
-      END IF
-*+    END WHILE
-*
-      RETURN
-*
-*     End of DLAMC4
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC5( BETA, P, EMIN, IEEE, EMAX, RMAX )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      LOGICAL            IEEE
-      INTEGER            BETA, EMAX, EMIN, P
-      DOUBLE PRECISION   RMAX
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC5 attempts to compute RMAX, the largest machine floating-point
-*  number, without overflow.  It assumes that EMAX + abs(EMIN) sum
-*  approximately to a power of 2.  It will fail on machines where this
-*  assumption does not hold, for example, the Cyber 205 (EMIN = -28625,
-*  EMAX = 28718).  It will also fail if the value supplied for EMIN is
-*  too large (i.e. too close to zero), probably with overflow.
-*
-*  Arguments
-*  =========
-*
-*  BETA    (input) INTEGER
-*          The base of floating-point arithmetic.
-*
-*  P       (input) INTEGER
-*          The number of base BETA digits in the mantissa of a
-*          floating-point value.
-*
-*  EMIN    (input) INTEGER
-*          The minimum exponent before (gradual) underflow.
-*
-*  IEEE    (input) LOGICAL
-*          A logical flag specifying whether or not the arithmetic
-*          system is thought to comply with the IEEE standard.
-*
-*  EMAX    (output) INTEGER
-*          The largest exponent before overflow
-*
-*  RMAX    (output) DOUBLE PRECISION
-*          The largest machine floating-point number.
-*
-* =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D0, ONE = 1.0D0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            EXBITS, EXPSUM, I, LEXP, NBITS, TRY, UEXP
-      DOUBLE PRECISION   OLDY, RECBAS, Y, Z
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MOD
-*     ..
-*     .. Executable Statements ..
-*
-*     First compute LEXP and UEXP, two powers of 2 that bound
-*     abs(EMIN). We then assume that EMAX + abs(EMIN) will sum
-*     approximately to the bound that is closest to abs(EMIN).
-*     (EMAX is the exponent of the required number RMAX).
-*
-      LEXP = 1
-      EXBITS = 1
-   10 CONTINUE
-      TRY = LEXP*2
-      IF( TRY.LE.( -EMIN ) ) THEN
-         LEXP = TRY
-         EXBITS = EXBITS + 1
-         GO TO 10
-      END IF
-      IF( LEXP.EQ.-EMIN ) THEN
-         UEXP = LEXP
-      ELSE
-         UEXP = TRY
-         EXBITS = EXBITS + 1
-      END IF
-*
-*     Now -LEXP is less than or equal to EMIN, and -UEXP is greater
-*     than or equal to EMIN. EXBITS is the number of bits needed to
-*     store the exponent.
-*
-      IF( ( UEXP+EMIN ).GT.( -LEXP-EMIN ) ) THEN
-         EXPSUM = 2*LEXP
-      ELSE
-         EXPSUM = 2*UEXP
-      END IF
-*
-*     EXPSUM is the exponent range, approximately equal to
-*     EMAX - EMIN + 1 .
-*
-      EMAX = EXPSUM + EMIN - 1
-      NBITS = 1 + EXBITS + P
-*
-*     NBITS is the total number of bits needed to store a
-*     floating-point number.
-*
-      IF( ( MOD( NBITS, 2 ).EQ.1 ) .AND. ( BETA.EQ.2 ) ) THEN
-*
-*        Either there are an odd number of bits used to store a
-*        floating-point number, which is unlikely, or some bits are
-*        not used in the representation of numbers, which is possible,
-*        (e.g. Cray machines) or the mantissa has an implicit bit,
-*        (e.g. IEEE machines, Dec Vax machines), which is perhaps the
-*        most likely. We have to assume the last alternative.
-*        If this is true, then we need to reduce EMAX by one because
-*        there must be some way of representing zero in an implicit-bit
-*        system. On machines like Cray, we are reducing EMAX by one
-*        unnecessarily.
-*
-         EMAX = EMAX - 1
-      END IF
-*
-      IF( IEEE ) THEN
-*
-*        Assume we are on an IEEE machine which reserves one exponent
-*        for infinity and NaN.
-*
-         EMAX = EMAX - 1
-      END IF
-*
-*     Now create RMAX, the largest machine number, which should
-*     be equal to (1.0 - BETA**(-P)) * BETA**EMAX .
-*
-*     First compute 1.0 - BETA**(-P), being careful that the
-*     result is less than 1.0 .
-*
-      RECBAS = ONE / BETA
-      Z = BETA - ONE
-      Y = ZERO
-      DO 20 I = 1, P
-         Z = Z*RECBAS
-         IF( Y.LT.ONE )
-     $      OLDY = Y
-         Y = DLAMC3( Y, Z )
-   20 CONTINUE
-      IF( Y.GE.ONE )
-     $   Y = OLDY
-*
-*     Now multiply by BETA**EMAX to get RMAX.
-*
-      DO 30 I = 1, EMAX
-         Y = DLAMC3( Y*BETA, ZERO )
-   30 CONTINUE
-*
-      RMAX = Y
-      RETURN
-*
-*     End of DLAMC5
-*
-      END
-      SUBROUTINE DLARF( SIDE, M, N, V, INCV, TAU, C, LDC, WORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE
-      INTEGER            INCV, LDC, M, N
-      DOUBLE PRECISION   TAU
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   C( LDC, * ), V( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARF applies a real elementary reflector H to a real m by n matrix
-*  C, from either the left or the right. H is represented in the form
-*
-*        H = I - tau * v * v'
-*
-*  where tau is a real scalar and v is a real vector.
-*
-*  If tau = 0, then H is taken to be the unit matrix.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': form  H * C
-*          = 'R': form  C * H
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  V       (input) DOUBLE PRECISION array, dimension
-*                     (1 + (M-1)*abs(INCV)) if SIDE = 'L'
-*                  or (1 + (N-1)*abs(INCV)) if SIDE = 'R'
-*          The vector v in the representation of H. V is not used if
-*          TAU = 0.
-*
-*  INCV    (input) INTEGER
-*          The increment between elements of v. INCV <> 0.
-*
-*  TAU     (input) DOUBLE PRECISION
-*          The value tau in the representation of H.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by the matrix H * C if SIDE = 'L',
-*          or C * H if SIDE = 'R'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDC >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension
-*                         (N) if SIDE = 'L'
-*                      or (M) if SIDE = 'R'
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEMV, DGER
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. Executable Statements ..
-*
-      IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*        Form  H * C
-*
-         IF( TAU.NE.ZERO ) THEN
-*
-*           w := C' * v
-*
-            CALL DGEMV( 'Transpose', M, N, ONE, C, LDC, V, INCV, ZERO,
-     $                  WORK, 1 )
-*
-*           C := C - v * w'
-*
-            CALL DGER( M, N, -TAU, V, INCV, WORK, 1, C, LDC )
-         END IF
-      ELSE
-*
-*        Form  C * H
-*
-         IF( TAU.NE.ZERO ) THEN
-*
-*           w := C * v
-*
-            CALL DGEMV( 'No transpose', M, N, ONE, C, LDC, V, INCV,
-     $                  ZERO, WORK, 1 )
-*
-*           C := C - w * v'
-*
-            CALL DGER( M, N, -TAU, WORK, 1, V, INCV, C, LDC )
-         END IF
-      END IF
-      RETURN
-*
-*     End of DLARF
-*
-      END
-      DOUBLE PRECISION FUNCTION DLAPY2( X, Y )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   X, Y
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAPY2 returns sqrt(x**2+y**2), taking care not to cause unnecessary
-*  overflow.
-*
-*  Arguments
-*  =========
-*
-*  X       (input) DOUBLE PRECISION
-*  Y       (input) DOUBLE PRECISION
-*          X and Y specify the values x and y.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER          ( ZERO = 0.0D0 )
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D0 )
-*     ..
-*     .. Local Scalars ..
-      DOUBLE PRECISION   W, XABS, YABS, Z
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, MIN, SQRT
-*     ..
-*     .. Executable Statements ..
-*
-      XABS = ABS( X )
-      YABS = ABS( Y )
-      W = MAX( XABS, YABS )
-      Z = MIN( XABS, YABS )
-      IF( Z.EQ.ZERO ) THEN
-         DLAPY2 = W
-      ELSE
-         DLAPY2 = W*SQRT( ONE+( Z / W )**2 )
-      END IF
-      RETURN
-*
-*     End of DLAPY2
-*
-      END
-      SUBROUTINE ZGERC ( M, N, ALPHA, X, INCX, Y, INCY, A, LDA )
-*     .. Scalar Arguments ..
-      COMPLEX*16         ALPHA
-      INTEGER            INCX, INCY, LDA, M, N
-*     .. Array Arguments ..
-      COMPLEX*16         A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZGERC  performs the rank 1 operation
-*
-*     A := alpha*x*conjg( y' ) + A,
-*
-*  where alpha is a scalar, x is an m element vector, y is an n element
-*  vector and A is an m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - COMPLEX*16      .
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  X      - COMPLEX*16       array of dimension at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the m
-*           element vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  Y      - COMPLEX*16       array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ).
-*           Before entry, the incremented array Y must contain the n
-*           element vector y.
-*           Unchanged on exit.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*  A      - COMPLEX*16       array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients. On exit, A is
-*           overwritten by the updated matrix.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      COMPLEX*16         ZERO
-      PARAMETER        ( ZERO = ( 0.0D+0, 0.0D+0 ) )
-*     .. Local Scalars ..
-      COMPLEX*16         TEMP
-      INTEGER            I, INFO, IX, J, JY, KX
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG, MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( M.LT.0 )THEN
-         INFO = 1
-      ELSE IF( N.LT.0 )THEN
-         INFO = 2
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 5
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 7
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 9
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'ZGERC ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.( ALPHA.EQ.ZERO ) )
-     $   RETURN
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( INCY.GT.0 )THEN
-         JY = 1
-      ELSE
-         JY = 1 - ( N - 1 )*INCY
-      END IF
-      IF( INCX.EQ.1 )THEN
-         DO 20, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*DCONJG( Y( JY ) )
-               DO 10, I = 1, M
-                  A( I, J ) = A( I, J ) + X( I )*TEMP
-   10          CONTINUE
-            END IF
-            JY = JY + INCY
-   20    CONTINUE
-      ELSE
-         IF( INCX.GT.0 )THEN
-            KX = 1
-         ELSE
-            KX = 1 - ( M - 1 )*INCX
-         END IF
-         DO 40, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*DCONJG( Y( JY ) )
-               IX   = KX
-               DO 30, I = 1, M
-                  A( I, J ) = A( I, J ) + X( IX )*TEMP
-                  IX        = IX        + INCX
-   30          CONTINUE
-            END IF
-            JY = JY + INCY
-   40    CONTINUE
-      END IF
-*
-      RETURN
-*
-*     End of ZGERC .
-*
-      END
-      double precision function dznrm2( n, zx, incx)
-      logical imag, scale
-      integer i, incx, ix, n, next
-      double precision cutlo, cuthi, hitest, sum, xmax, absx, zero, one
-      double complex      zx(1)
-      double precision dreal,dimag
-      double complex zdumr,zdumi
-      dreal(zdumr) = zdumr
-      dimag(zdumi) = (0.0d0,-1.0d0)*zdumi
-      data         zero, one /0.0d0, 1.0d0/
-c
-c     unitary norm of the complex n-vector stored in zx() with storage
-c     increment incx .
-c     if    n .le. 0 return with result = 0.
-c     if n .ge. 1 then incx must be .ge. 1
-c
-c           c.l.lawson , 1978 jan 08
-c     modified to correct problem with negative increment, 8/21/90.
-c
-c     four phase method     using two built-in constants that are
-c     hopefully applicable to all machines.
-c         cutlo = maximum of  sqrt(u/eps)  over all known machines.
-c         cuthi = minimum of  sqrt(v)      over all known machines.
-c     where
-c         eps = smallest no. such that eps + 1. .gt. 1.
-c         u   = smallest positive no.   (underflow limit)
-c         v   = largest  no.            (overflow  limit)
-c
-c     brief outline of algorithm..
-c
-c     phase 1    scans zero components.
-c     move to phase 2 when a component is nonzero and .le. cutlo
-c     move to phase 3 when a component is .gt. cutlo
-c     move to phase 4 when a component is .ge. cuthi/m
-c     where m = n for x() real and m = 2*n for complex.
-c
-c     values for cutlo and cuthi..
-c     from the environmental parameters listed in the imsl converter
-c     document the limiting values are as follows..
-c     cutlo, s.p.   u/eps = 2**(-102) for  honeywell.  close seconds are
-c                   univac and dec at 2**(-103)
-c                   thus cutlo = 2**(-51) = 4.44089e-16
-c     cuthi, s.p.   v = 2**127 for univac, honeywell, and dec.
-c                   thus cuthi = 2**(63.5) = 1.30438e19
-c     cutlo, d.p.   u/eps = 2**(-67) for honeywell and dec.
-c                   thus cutlo = 2**(-33.5) = 8.23181d-11
-c     cuthi, d.p.   same as s.p.  cuthi = 1.30438d19
-c     data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c     data cutlo, cuthi / 4.441e-16,  1.304e19 /
-      data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c
-      if(n .gt. 0) go to 10
-         dznrm2  = zero
-         go to 300
-c
-   10 assign 30 to next
-      sum = zero
-      i = 1
-      if( incx .lt. 0 )i = (-n+1)*incx + 1
-c                                                 begin main loop
-      do 220 ix = 1,n
-         absx = dabs(dreal(zx(i)))
-         imag = .false.
-         go to next,(30, 50, 70, 90, 110)
-   30 if( absx .gt. cutlo) go to 85
-      assign 50 to next
-      scale = .false.
-c
-c                        phase 1.  sum is zero
-c
-   50 if( absx .eq. zero) go to 200
-      if( absx .gt. cutlo) go to 85
-c
-c                                prepare for phase 2.
-      assign 70 to next
-      go to 105
-c
-c                                prepare for phase 4.
-c
-  100 assign 110 to next
-      sum = (sum / absx) / absx
-  105 scale = .true.
-      xmax = absx
-      go to 115
-c
-c                   phase 2.  sum is small.
-c                             scale to avoid destructive underflow.
-c
-   70 if( absx .gt. cutlo ) go to 75
-c
-c                     common code for phases 2 and 4.
-c                     in phase 4 sum is large.  scale to avoid overflow.
-c
-  110 if( absx .le. xmax ) go to 115
-         sum = one + sum * (xmax / absx)**2
-         xmax = absx
-         go to 200
-c
-  115 sum = sum + (absx/xmax)**2
-      go to 200
-c
-c
-c                  prepare for phase 3.
-c
-   75 sum = (sum * xmax) * xmax
-c
-   85 assign 90 to next
-      scale = .false.
-c
-c     for real or d.p. set hitest = cuthi/n
-c     for complex      set hitest = cuthi/(2*n)
-c
-      hitest = cuthi/dble( 2*n )
-c
-c                   phase 3.  sum is mid-range.  no scaling.
-c
-   90 if(absx .ge. hitest) go to 100
-         sum = sum + absx**2
-  200 continue
-c                  control selection of real and imaginary parts.
-c
-      if(imag) go to 210
-         absx = dabs(dimag(zx(i)))
-         imag = .true.
-      go to next,(  50, 70, 90, 110 )
-c
-  210 continue
-      i = i + incx
-  220 continue
-c
-c              end of main loop.
-c              compute square root and adjust for scaling.
-c
-      dznrm2 = dsqrt(sum)
-      if(scale) dznrm2 = dznrm2 * xmax
-  300 continue
-      return
-      end
-      SUBROUTINE DTRMV ( UPLO, TRANS, DIAG, N, A, LDA, X, INCX )
-*     .. Scalar Arguments ..
-      INTEGER            INCX, LDA, N
-      CHARACTER*1        DIAG, TRANS, UPLO
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DTRMV  performs one of the matrix-vector operations
-*
-*     x := A*x,   or   x := A'*x,
-*
-*  where x is an n element vector and  A is an n by n unit, or non-unit,
-*  upper or lower triangular matrix.
-*
-*  Parameters
-*  ==========
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the operation to be performed as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   x := A*x.
-*
-*              TRANS = 'T' or 't'   x := A'*x.
-*
-*              TRANS = 'C' or 'c'   x := A'*x.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit
-*           triangular as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the order of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry with  UPLO = 'U' or 'u', the leading n by n
-*           upper triangular part of the array A must contain the upper
-*           triangular matrix and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry with UPLO = 'L' or 'l', the leading n by n
-*           lower triangular part of the array A must contain the lower
-*           triangular matrix and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u', the diagonal elements of
-*           A are not referenced either, but are assumed to be unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, n ).
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the n
-*           element vector x. On exit, X is overwritten with the
-*           tranformed vector x.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER        ( ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, J, JX, KX
-      LOGICAL            NOUNIT
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( UPLO , 'U' ).AND.
-     $         .NOT.LSAME( UPLO , 'L' )      )THEN
-         INFO = 1
-      ELSE IF( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 2
-      ELSE IF( .NOT.LSAME( DIAG , 'U' ).AND.
-     $         .NOT.LSAME( DIAG , 'N' )      )THEN
-         INFO = 3
-      ELSE IF( N.LT.0 )THEN
-         INFO = 4
-      ELSE IF( LDA.LT.MAX( 1, N ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DTRMV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      NOUNIT = LSAME( DIAG, 'N' )
-*
-*     Set up the start point in X if the increment is not unity. This
-*     will be  ( N - 1 )*INCX  too small for descending loops.
-*
-      IF( INCX.LE.0 )THEN
-         KX = 1 - ( N - 1 )*INCX
-      ELSE IF( INCX.NE.1 )THEN
-         KX = 1
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  x := A*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 20, J = 1, N
-                  IF( X( J ).NE.ZERO )THEN
-                     TEMP = X( J )
-                     DO 10, I = 1, J - 1
-                        X( I ) = X( I ) + TEMP*A( I, J )
-   10                CONTINUE
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )*A( J, J )
-                  END IF
-   20          CONTINUE
-            ELSE
-               JX = KX
-               DO 40, J = 1, N
-                  IF( X( JX ).NE.ZERO )THEN
-                     TEMP = X( JX )
-                     IX   = KX
-                     DO 30, I = 1, J - 1
-                        X( IX ) = X( IX ) + TEMP*A( I, J )
-                        IX      = IX      + INCX
-   30                CONTINUE
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )*A( J, J )
-                  END IF
-                  JX = JX + INCX
-   40          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 60, J = N, 1, -1
-                  IF( X( J ).NE.ZERO )THEN
-                     TEMP = X( J )
-                     DO 50, I = N, J + 1, -1
-                        X( I ) = X( I ) + TEMP*A( I, J )
-   50                CONTINUE
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )*A( J, J )
-                  END IF
-   60          CONTINUE
-            ELSE
-               KX = KX + ( N - 1 )*INCX
-               JX = KX
-               DO 80, J = N, 1, -1
-                  IF( X( JX ).NE.ZERO )THEN
-                     TEMP = X( JX )
-                     IX   = KX
-                     DO 70, I = N, J + 1, -1
-                        X( IX ) = X( IX ) + TEMP*A( I, J )
-                        IX      = IX      - INCX
-   70                CONTINUE
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )*A( J, J )
-                  END IF
-                  JX = JX - INCX
-   80          CONTINUE
-            END IF
-         END IF
-      ELSE
-*
-*        Form  x := A'*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 100, J = N, 1, -1
-                  TEMP = X( J )
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 90, I = J - 1, 1, -1
-                     TEMP = TEMP + A( I, J )*X( I )
-   90             CONTINUE
-                  X( J ) = TEMP
-  100          CONTINUE
-            ELSE
-               JX = KX + ( N - 1 )*INCX
-               DO 120, J = N, 1, -1
-                  TEMP = X( JX )
-                  IX   = JX
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 110, I = J - 1, 1, -1
-                     IX   = IX   - INCX
-                     TEMP = TEMP + A( I, J )*X( IX )
-  110             CONTINUE
-                  X( JX ) = TEMP
-                  JX      = JX   - INCX
-  120          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 140, J = 1, N
-                  TEMP = X( J )
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 130, I = J + 1, N
-                     TEMP = TEMP + A( I, J )*X( I )
-  130             CONTINUE
-                  X( J ) = TEMP
-  140          CONTINUE
-            ELSE
-               JX = KX
-               DO 160, J = 1, N
-                  TEMP = X( JX )
-                  IX   = JX
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 150, I = J + 1, N
-                     IX   = IX   + INCX
-                     TEMP = TEMP + A( I, J )*X( IX )
-  150             CONTINUE
-                  X( JX ) = TEMP
-                  JX      = JX   + INCX
-  160          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DTRMV .
-*
-      END
-      SUBROUTINE DTRMM ( SIDE, UPLO, TRANSA, DIAG, M, N, ALPHA, A, LDA,
-     $                   B, LDB )
-*     .. Scalar Arguments ..
-      CHARACTER*1        SIDE, UPLO, TRANSA, DIAG
-      INTEGER            M, N, LDA, LDB
-      DOUBLE PRECISION   ALPHA
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), B( LDB, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DTRMM  performs one of the matrix-matrix operations
-*
-*     B := alpha*op( A )*B,   or   B := alpha*B*op( A ),
-*
-*  where  alpha  is a scalar,  B  is an m by n matrix,  A  is a unit, or
-*  non-unit,  upper or lower triangular matrix  and  op( A )  is one  of
-*
-*     op( A ) = A   or   op( A ) = A'.
-*
-*  Parameters
-*  ==========
-*
-*  SIDE   - CHARACTER*1.
-*           On entry,  SIDE specifies whether  op( A ) multiplies B from
-*           the left or right as follows:
-*
-*              SIDE = 'L' or 'l'   B := alpha*op( A )*B.
-*
-*              SIDE = 'R' or 'r'   B := alpha*B*op( A ).
-*
-*           Unchanged on exit.
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix A is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANSA - CHARACTER*1.
-*           On entry, TRANSA specifies the form of op( A ) to be used in
-*           the matrix multiplication as follows:
-*
-*              TRANSA = 'N' or 'n'   op( A ) = A.
-*
-*              TRANSA = 'T' or 't'   op( A ) = A'.
-*
-*              TRANSA = 'C' or 'c'   op( A ) = A'.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit triangular
-*           as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of B. M must be at
-*           least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of B.  N must be
-*           at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry,  ALPHA specifies the scalar  alpha. When  alpha is
-*           zero then  A is not referenced and  B need not be set before
-*           entry.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, k ), where k is m
-*           when  SIDE = 'L' or 'l'  and is  n  when  SIDE = 'R' or 'r'.
-*           Before entry  with  UPLO = 'U' or 'u',  the  leading  k by k
-*           upper triangular part of the array  A must contain the upper
-*           triangular matrix  and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry  with  UPLO = 'L' or 'l',  the  leading  k by k
-*           lower triangular part of the array  A must contain the lower
-*           triangular matrix  and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u',  the diagonal elements of
-*           A  are not referenced either,  but are assumed to be  unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program.  When  SIDE = 'L' or 'l'  then
-*           LDA  must be at least  max( 1, m ),  when  SIDE = 'R' or 'r'
-*           then LDA must be at least max( 1, n ).
-*           Unchanged on exit.
-*
-*  B      - DOUBLE PRECISION array of DIMENSION ( LDB, n ).
-*           Before entry,  the leading  m by n part of the array  B must
-*           contain the matrix  B,  and  on exit  is overwritten  by the
-*           transformed matrix.
-*
-*  LDB    - INTEGER.
-*           On entry, LDB specifies the first dimension of B as declared
-*           in  the  calling  (sub)  program.   LDB  must  be  at  least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 3 Blas routine.
-*
-*  -- Written on 8-February-1989.
-*     Jack Dongarra, Argonne National Laboratory.
-*     Iain Duff, AERE Harwell.
-*     Jeremy Du Croz, Numerical Algorithms Group Ltd.
-*     Sven Hammarling, Numerical Algorithms Group Ltd.
-*
-*
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     .. Local Scalars ..
-      LOGICAL            LSIDE, NOUNIT, UPPER
-      INTEGER            I, INFO, J, K, NROWA
-      DOUBLE PRECISION   TEMP
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE         , ZERO
-      PARAMETER        ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      LSIDE  = LSAME( SIDE  , 'L' )
-      IF( LSIDE )THEN
-         NROWA = M
-      ELSE
-         NROWA = N
-      END IF
-      NOUNIT = LSAME( DIAG  , 'N' )
-      UPPER  = LSAME( UPLO  , 'U' )
-*
-      INFO   = 0
-      IF(      ( .NOT.LSIDE                ).AND.
-     $         ( .NOT.LSAME( SIDE  , 'R' ) )      )THEN
-         INFO = 1
-      ELSE IF( ( .NOT.UPPER                ).AND.
-     $         ( .NOT.LSAME( UPLO  , 'L' ) )      )THEN
-         INFO = 2
-      ELSE IF( ( .NOT.LSAME( TRANSA, 'N' ) ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'T' ) ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'C' ) )      )THEN
-         INFO = 3
-      ELSE IF( ( .NOT.LSAME( DIAG  , 'U' ) ).AND.
-     $         ( .NOT.LSAME( DIAG  , 'N' ) )      )THEN
-         INFO = 4
-      ELSE IF( M  .LT.0               )THEN
-         INFO = 5
-      ELSE IF( N  .LT.0               )THEN
-         INFO = 6
-      ELSE IF( LDA.LT.MAX( 1, NROWA ) )THEN
-         INFO = 9
-      ELSE IF( LDB.LT.MAX( 1, M     ) )THEN
-         INFO = 11
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DTRMM ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-*     And when  alpha.eq.zero.
-*
-      IF( ALPHA.EQ.ZERO )THEN
-         DO 20, J = 1, N
-            DO 10, I = 1, M
-               B( I, J ) = ZERO
-   10       CONTINUE
-   20    CONTINUE
-         RETURN
-      END IF
-*
-*     Start the operations.
-*
-      IF( LSIDE )THEN
-         IF( LSAME( TRANSA, 'N' ) )THEN
-*
-*           Form  B := alpha*A*B.
-*
-            IF( UPPER )THEN
-               DO 50, J = 1, N
-                  DO 40, K = 1, M
-                     IF( B( K, J ).NE.ZERO )THEN
-                        TEMP = ALPHA*B( K, J )
-                        DO 30, I = 1, K - 1
-                           B( I, J ) = B( I, J ) + TEMP*A( I, K )
-   30                   CONTINUE
-                        IF( NOUNIT )
-     $                     TEMP = TEMP*A( K, K )
-                        B( K, J ) = TEMP
-                     END IF
-   40             CONTINUE
-   50          CONTINUE
-            ELSE
-               DO 80, J = 1, N
-                  DO 70 K = M, 1, -1
-                     IF( B( K, J ).NE.ZERO )THEN
-                        TEMP      = ALPHA*B( K, J )
-                        B( K, J ) = TEMP
-                        IF( NOUNIT )
-     $                     B( K, J ) = B( K, J )*A( K, K )
-                        DO 60, I = K + 1, M
-                           B( I, J ) = B( I, J ) + TEMP*A( I, K )
-   60                   CONTINUE
-                     END IF
-   70             CONTINUE
-   80          CONTINUE
-            END IF
-         ELSE
-*
-*           Form  B := alpha*B*A'.
-*
-            IF( UPPER )THEN
-               DO 110, J = 1, N
-                  DO 100, I = M, 1, -1
-                     TEMP = B( I, J )
-                     IF( NOUNIT )
-     $                  TEMP = TEMP*A( I, I )
-                     DO 90, K = 1, I - 1
-                        TEMP = TEMP + A( K, I )*B( K, J )
-   90                CONTINUE
-                     B( I, J ) = ALPHA*TEMP
-  100             CONTINUE
-  110          CONTINUE
-            ELSE
-               DO 140, J = 1, N
-                  DO 130, I = 1, M
-                     TEMP = B( I, J )
-                     IF( NOUNIT )
-     $                  TEMP = TEMP*A( I, I )
-                     DO 120, K = I + 1, M
-                        TEMP = TEMP + A( K, I )*B( K, J )
-  120                CONTINUE
-                     B( I, J ) = ALPHA*TEMP
-  130             CONTINUE
-  140          CONTINUE
-            END IF
-         END IF
-      ELSE
-         IF( LSAME( TRANSA, 'N' ) )THEN
-*
-*           Form  B := alpha*B*A.
-*
-            IF( UPPER )THEN
-               DO 180, J = N, 1, -1
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 150, I = 1, M
-                     B( I, J ) = TEMP*B( I, J )
-  150             CONTINUE
-                  DO 170, K = 1, J - 1
-                     IF( A( K, J ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( K, J )
-                        DO 160, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  160                   CONTINUE
-                     END IF
-  170             CONTINUE
-  180          CONTINUE
-            ELSE
-               DO 220, J = 1, N
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 190, I = 1, M
-                     B( I, J ) = TEMP*B( I, J )
-  190             CONTINUE
-                  DO 210, K = J + 1, N
-                     IF( A( K, J ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( K, J )
-                        DO 200, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  200                   CONTINUE
-                     END IF
-  210             CONTINUE
-  220          CONTINUE
-            END IF
-         ELSE
-*
-*           Form  B := alpha*B*A'.
-*
-            IF( UPPER )THEN
-               DO 260, K = 1, N
-                  DO 240, J = 1, K - 1
-                     IF( A( J, K ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( J, K )
-                        DO 230, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  230                   CONTINUE
-                     END IF
-  240             CONTINUE
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( K, K )
-                  IF( TEMP.NE.ONE )THEN
-                     DO 250, I = 1, M
-                        B( I, K ) = TEMP*B( I, K )
-  250                CONTINUE
-                  END IF
-  260          CONTINUE
-            ELSE
-               DO 300, K = N, 1, -1
-                  DO 280, J = K + 1, N
-                     IF( A( J, K ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( J, K )
-                        DO 270, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  270                   CONTINUE
-                     END IF
-  280             CONTINUE
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( K, K )
-                  IF( TEMP.NE.ONE )THEN
-                     DO 290, I = 1, M
-                        B( I, K ) = TEMP*B( I, K )
-  290                CONTINUE
-                  END IF
-  300          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DTRMM .
-*
-      END
-      SUBROUTINE DGEMM ( TRANSA, TRANSB, M, N, K, ALPHA, A, LDA, B, LDB,
-     $                   BETA, C, LDC )
-*     .. Scalar Arguments ..
-      CHARACTER*1        TRANSA, TRANSB
-      INTEGER            M, N, K, LDA, LDB, LDC
-      DOUBLE PRECISION   ALPHA, BETA
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), B( LDB, * ), C( LDC, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEMM  performs one of the matrix-matrix operations
-*
-*     C := alpha*op( A )*op( B ) + beta*C,
-*
-*  where  op( X ) is one of
-*
-*     op( X ) = X   or   op( X ) = X',
-*
-*  alpha and beta are scalars, and A, B and C are matrices, with op( A )
-*  an m by k matrix,  op( B )  a  k by n matrix and  C an m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  TRANSA - CHARACTER*1.
-*           On entry, TRANSA specifies the form of op( A ) to be used in
-*           the matrix multiplication as follows:
-*
-*              TRANSA = 'N' or 'n',  op( A ) = A.
-*
-*              TRANSA = 'T' or 't',  op( A ) = A'.
-*
-*              TRANSA = 'C' or 'c',  op( A ) = A'.
-*
-*           Unchanged on exit.
-*
-*  TRANSB - CHARACTER*1.
-*           On entry, TRANSB specifies the form of op( B ) to be used in
-*           the matrix multiplication as follows:
-*
-*              TRANSB = 'N' or 'n',  op( B ) = B.
-*
-*              TRANSB = 'T' or 't',  op( B ) = B'.
-*
-*              TRANSB = 'C' or 'c',  op( B ) = B'.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry,  M  specifies  the number  of rows  of the  matrix
-*           op( A )  and of the  matrix  C.  M  must  be at least  zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry,  N  specifies the number  of columns of the matrix
-*           op( B ) and the number of columns of the matrix C. N must be
-*           at least zero.
-*           Unchanged on exit.
-*
-*  K      - INTEGER.
-*           On entry,  K  specifies  the number of columns of the matrix
-*           op( A ) and the number of rows of the matrix op( B ). K must
-*           be at least  zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, ka ), where ka is
-*           k  when  TRANSA = 'N' or 'n',  and is  m  otherwise.
-*           Before entry with  TRANSA = 'N' or 'n',  the leading  m by k
-*           part of the array  A  must contain the matrix  A,  otherwise
-*           the leading  k by m  part of the array  A  must contain  the
-*           matrix A.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. When  TRANSA = 'N' or 'n' then
-*           LDA must be at least  max( 1, m ), otherwise  LDA must be at
-*           least  max( 1, k ).
-*           Unchanged on exit.
-*
-*  B      - DOUBLE PRECISION array of DIMENSION ( LDB, kb ), where kb is
-*           n  when  TRANSB = 'N' or 'n',  and is  k  otherwise.
-*           Before entry with  TRANSB = 'N' or 'n',  the leading  k by n
-*           part of the array  B  must contain the matrix  B,  otherwise
-*           the leading  n by k  part of the array  B  must contain  the
-*           matrix B.
-*           Unchanged on exit.
-*
-*  LDB    - INTEGER.
-*           On entry, LDB specifies the first dimension of B as declared
-*           in the calling (sub) program. When  TRANSB = 'N' or 'n' then
-*           LDB must be at least  max( 1, k ), otherwise  LDB must be at
-*           least  max( 1, n ).
-*           Unchanged on exit.
-*
-*  BETA   - DOUBLE PRECISION.
-*           On entry,  BETA  specifies the scalar  beta.  When  BETA  is
-*           supplied as zero then C need not be set on input.
-*           Unchanged on exit.
-*
-*  C      - DOUBLE PRECISION array of DIMENSION ( LDC, n ).
-*           Before entry, the leading  m by n  part of the array  C must
-*           contain the matrix  C,  except when  beta  is zero, in which
-*           case C need not be set on entry.
-*           On exit, the array  C  is overwritten by the  m by n  matrix
-*           ( alpha*op( A )*op( B ) + beta*C ).
-*
-*  LDC    - INTEGER.
-*           On entry, LDC specifies the first dimension of C as declared
-*           in  the  calling  (sub)  program.   LDC  must  be  at  least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 3 Blas routine.
-*
-*  -- Written on 8-February-1989.
-*     Jack Dongarra, Argonne National Laboratory.
-*     Iain Duff, AERE Harwell.
-*     Jeremy Du Croz, Numerical Algorithms Group Ltd.
-*     Sven Hammarling, Numerical Algorithms Group Ltd.
-*
-*
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     .. Local Scalars ..
-      LOGICAL            NOTA, NOTB
-      INTEGER            I, INFO, J, L, NCOLA, NROWA, NROWB
-      DOUBLE PRECISION   TEMP
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE         , ZERO
-      PARAMETER        ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Executable Statements ..
-*
-*     Set  NOTA  and  NOTB  as  true if  A  and  B  respectively are not
-*     transposed and set  NROWA, NCOLA and  NROWB  as the number of rows
-*     and  columns of  A  and the  number of  rows  of  B  respectively.
-*
-      NOTA  = LSAME( TRANSA, 'N' )
-      NOTB  = LSAME( TRANSB, 'N' )
-      IF( NOTA )THEN
-         NROWA = M
-         NCOLA = K
-      ELSE
-         NROWA = K
-         NCOLA = M
-      END IF
-      IF( NOTB )THEN
-         NROWB = K
-      ELSE
-         NROWB = N
-      END IF
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF(      ( .NOT.NOTA                 ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'C' ) ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'T' ) )      )THEN
-         INFO = 1
-      ELSE IF( ( .NOT.NOTB                 ).AND.
-     $         ( .NOT.LSAME( TRANSB, 'C' ) ).AND.
-     $         ( .NOT.LSAME( TRANSB, 'T' ) )      )THEN
-         INFO = 2
-      ELSE IF( M  .LT.0               )THEN
-         INFO = 3
-      ELSE IF( N  .LT.0               )THEN
-         INFO = 4
-      ELSE IF( K  .LT.0               )THEN
-         INFO = 5
-      ELSE IF( LDA.LT.MAX( 1, NROWA ) )THEN
-         INFO = 8
-      ELSE IF( LDB.LT.MAX( 1, NROWB ) )THEN
-         INFO = 10
-      ELSE IF( LDC.LT.MAX( 1, M     ) )THEN
-         INFO = 13
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DGEMM ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.
-     $    ( ( ( ALPHA.EQ.ZERO ).OR.( K.EQ.0 ) ).AND.( BETA.EQ.ONE ) ) )
-     $   RETURN
-*
-*     And if  alpha.eq.zero.
-*
-      IF( ALPHA.EQ.ZERO )THEN
-         IF( BETA.EQ.ZERO )THEN
-            DO 20, J = 1, N
-               DO 10, I = 1, M
-                  C( I, J ) = ZERO
-   10          CONTINUE
-   20       CONTINUE
-         ELSE
-            DO 40, J = 1, N
-               DO 30, I = 1, M
-                  C( I, J ) = BETA*C( I, J )
-   30          CONTINUE
-   40       CONTINUE
-         END IF
-         RETURN
-      END IF
-*
-*     Start the operations.
-*
-      IF( NOTB )THEN
-         IF( NOTA )THEN
-*
-*           Form  C := alpha*A*B + beta*C.
-*
-            DO 90, J = 1, N
-               IF( BETA.EQ.ZERO )THEN
-                  DO 50, I = 1, M
-                     C( I, J ) = ZERO
-   50             CONTINUE
-               ELSE IF( BETA.NE.ONE )THEN
-                  DO 60, I = 1, M
-                     C( I, J ) = BETA*C( I, J )
-   60             CONTINUE
-               END IF
-               DO 80, L = 1, K
-                  IF( B( L, J ).NE.ZERO )THEN
-                     TEMP = ALPHA*B( L, J )
-                     DO 70, I = 1, M
-                        C( I, J ) = C( I, J ) + TEMP*A( I, L )
-   70                CONTINUE
-                  END IF
-   80          CONTINUE
-   90       CONTINUE
-         ELSE
-*
-*           Form  C := alpha*A'*B + beta*C
-*
-            DO 120, J = 1, N
-               DO 110, I = 1, M
-                  TEMP = ZERO
-                  DO 100, L = 1, K
-                     TEMP = TEMP + A( L, I )*B( L, J )
-  100             CONTINUE
-                  IF( BETA.EQ.ZERO )THEN
-                     C( I, J ) = ALPHA*TEMP
-                  ELSE
-                     C( I, J ) = ALPHA*TEMP + BETA*C( I, J )
-                  END IF
-  110          CONTINUE
-  120       CONTINUE
-         END IF
-      ELSE
-         IF( NOTA )THEN
-*
-*           Form  C := alpha*A*B' + beta*C
-*
-            DO 170, J = 1, N
-               IF( BETA.EQ.ZERO )THEN
-                  DO 130, I = 1, M
-                     C( I, J ) = ZERO
-  130             CONTINUE
-               ELSE IF( BETA.NE.ONE )THEN
-                  DO 140, I = 1, M
-                     C( I, J ) = BETA*C( I, J )
-  140             CONTINUE
-               END IF
-               DO 160, L = 1, K
-                  IF( B( J, L ).NE.ZERO )THEN
-                     TEMP = ALPHA*B( J, L )
-                     DO 150, I = 1, M
-                        C( I, J ) = C( I, J ) + TEMP*A( I, L )
-  150                CONTINUE
-                  END IF
-  160          CONTINUE
-  170       CONTINUE
-         ELSE
-*
-*           Form  C := alpha*A'*B' + beta*C
-*
-            DO 200, J = 1, N
-               DO 190, I = 1, M
-                  TEMP = ZERO
-                  DO 180, L = 1, K
-                     TEMP = TEMP + A( L, I )*B( J, L )
-  180             CONTINUE
-                  IF( BETA.EQ.ZERO )THEN
-                     C( I, J ) = ALPHA*TEMP
-                  ELSE
-                     C( I, J ) = ALPHA*TEMP + BETA*C( I, J )
-                  END IF
-  190          CONTINUE
-  200       CONTINUE
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DGEMM .
-*
-      END
-      subroutine  dcopy(n,dx,incx,dy,incy)
-c
-c     copies a vector, x, to a vector, y.
-c     uses unrolled loops for increments equal to one.
-c     jack dongarra, linpack, 3/11/78.
-c
-      double precision dx(1),dy(1)
-      integer i,incx,incy,ix,iy,m,mp1,n
-c
-      if(n.le.0)return
-      if(incx.eq.1.and.incy.eq.1)go to 20
-c
-c        code for unequal increments or equal increments
-c          not equal to 1
-c
-      ix = 1
-      iy = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      if(incy.lt.0)iy = (-n+1)*incy + 1
-      do 10 i = 1,n
-        dy(iy) = dx(ix)
-        ix = ix + incx
-        iy = iy + incy
-   10 continue
-      return
-c
-c        code for both increments equal to 1
-c
-c
-c        clean-up loop
-c
-   20 m = mod(n,7)
-      if( m .eq. 0 ) go to 40
-      do 30 i = 1,m
-        dy(i) = dx(i)
-   30 continue
-      if( n .lt. 7 ) return
-   40 mp1 = m + 1
-      do 50 i = mp1,n,7
-        dy(i) = dx(i)
-        dy(i + 1) = dx(i + 1)
-        dy(i + 2) = dx(i + 2)
-        dy(i + 3) = dx(i + 3)
-        dy(i + 4) = dx(i + 4)
-        dy(i + 5) = dx(i + 5)
-        dy(i + 6) = dx(i + 6)
-   50 continue
-      return
-      end
-      SUBROUTINE DLADIV( A, B, C, D, P, Q )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   A, B, C, D, P, Q
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLADIV performs complex division in  real arithmetic
-*
-*                        a + i*b
-*             p + i*q = ---------
-*                        c + i*d
-*
-*  The algorithm is due to Robert L. Smith and can be found
-*  in D. Knuth, The art of Computer Programming, Vol.2, p.195
-*
-*  Arguments
-*  =========
-*
-*  A       (input) DOUBLE PRECISION
-*  B       (input) DOUBLE PRECISION
-*  C       (input) DOUBLE PRECISION
-*  D       (input) DOUBLE PRECISION
-*          The scalars a, b, c, and d in the above expression.
-*
-*  P       (output) DOUBLE PRECISION
-*  Q       (output) DOUBLE PRECISION
-*          The scalars p and q in the above expression.
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      DOUBLE PRECISION   E, F
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS
-*     ..
-*     .. Executable Statements ..
-*
-      IF( ABS( D ).LT.ABS( C ) ) THEN
-         E = D / C
-         F = C + D*E
-         P = ( A+B*E ) / F
-         Q = ( B-A*E ) / F
-      ELSE
-         E = C / D
-         F = D + C*E
-         P = ( B+A*E ) / F
-         Q = ( -A+B*E ) / F
-      END IF
-*
-      RETURN
-*
-*     End of DLADIV
-*
-      END
diff --git a/sandbox/801/Src/polsys_plp.f90 b/sandbox/801/Src/polsys_plp.f90
deleted file mode 100644
index 9517087..0000000
--- a/sandbox/801/Src/polsys_plp.f90
+++ /dev/null
@@ -1,2951 +0,0 @@
-! This file contains all the modules and external subroutines for the
-! package POLSYS_PLP, except for the LAPACK routines used, which are
-! distributed in a separate file.  Layne T. Watson, Steven M. Wise, Andrew
-! J. Sommese, August, 1998.  Cosmetic changes, 10/1999.
-
-      MODULE REAL_PRECISION  ! HOMPACK90 module for 64-bit arithmetic.
-      INTEGER, PARAMETER:: R8=SELECTED_REAL_KIND(13)
-      END MODULE REAL_PRECISION
-
-                                                                      !!!
-MODULE GLOBAL_PLP
-
-! The module GLOBAL_PLP contains derived data types, arrays, and
-! functions used in POLSYS_PLP and related subroutines.  GLOBAL_PLP uses
-! the HOMPACK90 module REAL_PRECISION for 64-bit arithmetic.
-
-USE REAL_PRECISION, ONLY: R8
-IMPLICIT NONE
-INTEGER, PARAMETER:: LARGE=SELECTED_INT_KIND(15)
-REAL (KIND=R8), PARAMETER:: PI=3.1415926535897932384626433_R8
-
-
-! TARGET SYSTEM: Let X be a complex N-dimensional vector.  POLSYS_PLP
-! is used to solve the polynomial system, called the target system,
-! F(X)=0, where F is represented by the following derived data types:
-
-TYPE TERM_TYPE
-   COMPLEX (KIND=R8):: COEF
-   INTEGER, DIMENSION(:), POINTER:: DEG
-END TYPE TERM_TYPE
-TYPE POLYNOMIAL_TYPE
-   TYPE(TERM_TYPE), DIMENSION(:), POINTER:: TERM
-   INTEGER:: NUM_TERMS
-END TYPE POLYNOMIAL_TYPE
-TYPE(POLYNOMIAL_TYPE), DIMENSION(:), ALLOCATABLE:: POLYNOMIAL
-
-! The mathematical representation of the target system F is, for I=1,...,N,
-!
-! F_I(X) = SUM_{J=1}^{POLYNOMIAL(I)%NUM_TERMS}
-!          POLYNOMIAL(I)%TERM(J)%COEF * 
-!          PRODUCT_{K=1}^N  X(K)**POLYNOMIAL(I)%TERM(J)%DEG(K).
-!
-! Any program calling POLSYS_PLP (such as the sample main program
-! MAIN_TEMPLATE) must aquire data and allocate storage for the target
-! system as illustrated below:  
-!
-! ALLOCATE(POLYNOMIAL(N))
-! DO I=1,N
-!   READ (*,*) POLYNOMIAL(I)%NUM_TERMS
-!   ALLOCATE(POLYNOMIAL(I)%TERM(POLYNOMIAL(I)%NUM_TERMS))
-!   DO J=1,POLYNOMIAL(I)%NUM_TERMS
-!     ALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG(N+1))
-!     READ (*,*) POLYNOMIAL(I)%TERM(J)%COEF,POLYNOMIAL(I)%TERM(J)%DEG(1:N)
-!   END DO
-! END DO
-!
-! START SYSTEM/PARTITION:  In a partitioned linear product (PLP)
-! formulation the start system G(X)=0 and the variable partition
-! P have the same structure.  G and P are represented by the derived data
-! types:
-
-INTEGER, DIMENSION(:), ALLOCATABLE:: PARTITION_SIZES
-TYPE SET_TYPE 
-   INTEGER, DIMENSION(:), POINTER:: INDEX
-   INTEGER:: NUM_INDICES
-   INTEGER:: SET_DEG
-   COMPLEX (KIND=R8), DIMENSION(:), POINTER:: START_COEF
-END TYPE SET_TYPE
-TYPE PARTITION_TYPE
-   TYPE(SET_TYPE), DIMENSION(:), POINTER:: SET 
-END TYPE PARTITION_TYPE
-TYPE(PARTITION_TYPE), DIMENSION(:), ALLOCATABLE:: PARTITION
-
-! The mathematical representation of the start system G is, for I=1,...,N,
-!
-! G_I(X) = PRODUCT_{J=1}^{PARTITION_SIZES(I)}
-!          ( L(I,J)**PARTITION(I)SET(J)%SET_DEG - 1.0 ),
-!
-! where the linear factors L(I,J) are
-!
-! L(I,J) = SUM_{K=1}^{PARTITION(I)%SET(J)%NUM_INDICES}
-!   PARTITION(I)%SET(J)%START_COEF(K) * X(PARTITION(I)%SET(J)%INDEX(K)).
-!
-! The system partition P=(P(1),...,P(N)) is comprised of the component
-! partitions P(I) = {S(I,1),...S(I, PARTITION_SIZES(I))}, where the sets
-! of variables S(I,J) are defined by
-!
-! S(I,J) = UNION_{K=1}^{PARTITION(I)%SET(J)%NUM_INDICES}
-!          { X(PARTITION(I)%SET(J)%INDEX(K)) }.
-!
-! The calling program must acquire data and allocate storage as
-! illustrated below:
-!
-! ALLOCATE(PARTITION_SIZES(N))
-! READ (*,*) PARTITION_SIZES(1:N)
-! ALLOCATE(PARTITION(N))
-! DO I=1,N
-!   ALLOCATE(PARTITION(I)%SET(PARTITION_SIZES(I))
-!   DO J=1, PARTITION_SIZES(I)
-!     READ (*,*) PARTITION(I)%SET(J)%NUM_INDICES
-!     ALLOCATE(PARTITION(I)%SET(J)%INDEX(PARTITION(I)%SET(J)%NUM_INDICES))
-!     READ (*,*) PARTITION(I)%SET(J)%INDEX
-!   END DO
-! END DO
-!
-! SET_DEG and START_COEF are calculated by POLSYS_PLP.
-
-
-CONTAINS
-
-! INDEXING FUNCTIONS FOR THE TARGET SYSTEM:
-!
-! C(I,J) retrieves the coefficient of the Jth term of the Ith polynomial
-! component of the target system.
-
-COMPLEX (KIND=R8) FUNCTION C(I,J) 
-  IMPLICIT NONE
-  INTEGER:: I,J
-  C = POLYNOMIAL(I)%TERM(J)%COEF
-END FUNCTION C
-
-! D(I,J,K) retrieves the degree of the Kth variable in the Jth term of
-! the Ith polynomial component of the target system.
-
-INTEGER FUNCTION D(I,J,K)
-  IMPLICIT NONE
-  INTEGER:: I,J,K
-  D = POLYNOMIAL(I)%TERM(J)%DEG(K)
-END FUNCTION D
-
-! NUMT(I) retrieves the number of terms in the Ith polynomial component of
-! the target system F(X).
-
-INTEGER FUNCTION NUMT(I)
-  IMPLICIT NONE
-  INTEGER:: I
-  NUMT = POLYNOMIAL(I)%NUM_TERMS 
-END FUNCTION NUMT
-
-! The target system is succinctly specified with the retrieval functions:
-!
-! F_I(X) = SUM_{J=1}^{NUMT(I)} C(I,J) * PRODUCT_{K=1}^N  X(K)**D(I,J,K).
-!
-! INDEXING FUNCTIONS FOR THE START SYSTEM/PARTITION:
-!
-! PAR(I,J,K) retrieves the index of the Kth variable in the Jth set
-! S(I,J) of the Ith partition P(I).
-
-INTEGER FUNCTION PAR(I,J,K)
-  IMPLICIT NONE
-  INTEGER:: I,J,K
-  PAR = PARTITION(I)%SET(J)%INDEX(K)
-END FUNCTION PAR
-
-! SC(I,J,K) retrieves the coefficient of the variable with index
-! PAR(I,J,K) in the Jth factor of the Ith component of the start system
-! G(X).
-
-COMPLEX (KIND=R8) FUNCTION SC(I,J,K)
-  IMPLICIT NONE
-  INTEGER:: I,J,K
-  SC = PARTITION(I)%SET(J)%START_COEF(K)
-END FUNCTION SC
-
-! SD(I,J) retrieves the set degree of the Jth set S(I,J) in the Ith
-! partition P(I).
-
-INTEGER FUNCTION SD(I,J)
-  IMPLICIT NONE
-  INTEGER:: I,J
-  SD = PARTITION(I)%SET(J)%SET_DEG
-END FUNCTION SD
-
-! NUMV(I,J) retrieves the number of variables in the Jth set S(I,J) of
-! the Ith partition P(I).
-
-INTEGER FUNCTION NUMV(I,J)
-  IMPLICIT NONE
-  INTEGER:: I,J
-  NUMV = PARTITION(I)%SET(J)%NUM_INDICES
-END FUNCTION NUMV
-
-! Both the start system and the partition are succinctly specified with
-! retrieval functions: 
-!
-! G_I(X) = PRODUCT_{J=1}^{PARTITION_SIZES(I)}
-! ( [ SUM_{K=1}^{NUMV(I,J)} SC(I,J,K)*X(PAR(I,J,K)) ]**SD(I,J) - 1.0 ),
-!
-! and P(I) = { S(I,1),...,S(I,PARTITION_SIZES(I)) }, where
-!
-! S(I,J) = UNION_{K=1}^{NUMV(I,J)} { X(PAR(I,J,K)) }.
-
-END MODULE GLOBAL_PLP
-
-                                                                     !!!
-MODULE POLSYS
-
-! This module contains the subroutines POLSYS_PLP (finds all or some of
-! the roots of a polynomial system defined in the module GLOBAL_PLP),
-! BEZOUT_PLP (computes the generalized Bezout number), and SINGSYS_PLP
-! (checks the nonsingularity of a generic start point).  Typically a
-! user would only call POLSYS_PLP, and thus include in their main
-! program the statements:
-!   USE GLOBAL_PLP
-!   USE POLSYS, ONLY: POLSYS_PLP
-! An expert user might want to call BEZOUT_PLP or SINGSYS_PLP
-! separately, and thus these routines are also provided as module
-! procedures.
-
-USE GLOBAL_PLP
-CONTAINS
-                                                                     !!!
-SUBROUTINE POLSYS_PLP(N,TRACKTOL,FINALTOL,SINGTOL,SSPAR,BPLP,IFLAG1,   &
-           IFLAG2,ARCLEN,LAMBDA,ROOTS,NFE,SCALE_FACTORS,               &
-           NUMRR,RECALL,NO_SCALING,USER_F_DF)
-
-! Using a probability-one globally convergent homotopy method,
-! POLSYS_PLP finds all finite isolated complex solutions to a system
-! F(X) = 0 of N polynomial equations in N unknowns with complex
-! coefficients.  A partitioned linear product (PLP) formulation is used
-! for the start system of the homotopy map.
-!
-! POLSYS_PLP uses the module GLOBAL_PLP, which contains the definition
-! of the polynomial system to be solved, and also defines the notation
-! used below.  The user may also find it beneficial at some point to
-! refer to the documentation for STEPNX in the HOMPACK90 package.
-!
-! The representation of F(X) is stored in the module GLOBAL_PLP.  Using
-! the same notation as GLOBAL_PLP, F(X) is defined mathematically by
-!
-! F_I(X)=SUM_{J=1}^{NUMT(I)} C(I,J) * PRODUCT_{K=1}^N X(K)**D(I,J,K),
-!
-! for I=1,...,N.
-! 
-! POLSYS_PLP features target system scaling, a projective
-! transformation so that the homotopy zero curves are tracked in complex
-! projective space, and a partitioned linear product (PLP) formulation of
-! the start system.  Scaling may be disabled by the optional argument
-! NO_SCALING.  Whatever the case, the roots of F(X) are always returned
-! unscaled and untransformed.  The PLP partition (an m-homogeneous
-! partition of the variables, possibly different for each component
-! F_I(X)) is defined in the module GLOBAL_PLP.
-!
-! Scaling is carried out in the internal subroutine SCALE_PLP, and is
-! an independent preprocessing step.  SCALE_PLP modifies the polynomial
-! coefficients and creates and stores unscaling factors SCALE_FACTORS
-! for the variables X(I).  The problem is solved with the scaled
-! coefficients and scaled variables.  The coefficients of the target
-! polynomial system, which are contained in the global structure
-! POLYNOMIAL, remain in modified form on return from POLSYS_PLP.
-!
-! With the projective transformation, the system is essentially recast in
-! homogeneous coordinates, Z(1),...,Z(N+1), and solved in complex
-! projective space.  The resulting solutions are untransformed via
-! X(I) = Z(I)/Z(N+1), I=1,...N, unless this division would cause
-! overflow, in which case Re(X(I)) = Im(X(I)) = HUGE(1.0_R8).
-! On return, for the Jth path, ROOTS(I,J) = X(I) for I=1,...,N, and
-! ROOTS(N+1,J) = Z(N+1), the homogeneous variable.
-!
-! In the PLP scheme the number of paths that must be tracked can be
-! less, and commonly far less, than the "total degree" because of the
-! specialized start system G(X) = 0.  The structure of the start system
-! is determined by the system partition P.  The representations of both
-! are stored in the module GLOBAL_PLP, and following the comments there,
-! are defined mathematically as follows:
-!
-! The system partition P=(P(1),...,P(N)) is comprised of the component
-! partitions P(I)={S(I,1),...,S(I,PARTITION_SIZES(I))}, where the sets of
-! variables S(I,J) are defined by
-!
-! S(I,J) = UNION_{K=1}^{NUMV(I,J)} {X(PAR(I,J,K))}.
-!
-! The only restriction on the system partition P is that each component
-! partition P(I) should be a partition of the set {X(1),...,X(N)}, that
-! is, the three following properties should hold for each I=1,...,N:
-!
-! i)    each set S(I,J) has cardinality NUMV(I,J) > 0,
-!
-! ii)   S(I,J1) INTERSECTION S(I,J2) = { }, for J1 /= J2, and
-!
-! iii)  UNION_{J=1}^{PARTITION_SIZES(I)} S(I,J) = {X(1),...,X(N)}.
-!
-! The start system is defined mathematically, for I=1,...,N, by
-! 
-! G_I(X) = PRODUCT_{J=1}^{PARTITION_SIZES(I)} ( L(I,J)**SD(I,J)-1.0 ),
-!
-! where the linear factors L(I,J) are
-!
-! L(I,J) = SUM{K=1}^{NUMV(I,J)} SC(I,J,K)*X(PAR(I,J,K)).
-!
-! Contained in this module (POLSYS) is the routine BEZOUT_PLP.  This
-! routine calculates the generalized PLP Bezout number, based on the
-! system partition P provided by the user, by counting the number of
-! solutions to the start system.  The user is encouraged to explore
-! several system partitions with BEZOUT_PLP before calling POLSYS_PLP. 
-! See the sample calling program MAIN_TEMPLATE and the comments in
-! BEZOUT_PLP.
-!
-! Internal routines:  INIT_PLP, INTERP, OUTPUT_PLP, RHO, ROOT_OF_UNITY,
-!   ROOT_PLP, SCALE_PLP, START_POINTS_PLP, START_SYSTEM, TANGENT_PLP,
-!   TARGET_SYSTEM. 
-!
-! External routines called:  BEZOUT_PLP, SINGSYS_PLP, STEPNX.
-!
-!
-! On input:
-!
-! N is the dimension of the target polynomial system.
-!
-! TRACKTOL is the local error tolerance allowed the path tracker along
-!   the path.  ABSERR and RELERR (of STEPNX) are set to TRACKTOL.
-!
-! FINALTOL is the accuracy desired for the final solution.  It is used
-!   for both the absolute and relative errors in a mixed error criterion.
-!
-! SINGTOL is the singularity test threshold used by SINGSYS_PLP.  If
-!   SINGTOL <= 0.0 on input, then SINGTOL is reset to a default value.
-!
-! SSPAR(1:8) = (LIDEAL, RIDEAL, DIDEAL, HMIN, HMAX, BMIN, BMAX, P) is a
-!   vector of parameters used for the optimal step size estimation. If
-!   SSPAR(I) <= 0.0 on input, it is reset to a default value by STEPNX. 
-!   See the comments in STEPNX for more information.
-!
-! Optional arguments:
-!
-! NUMRR is the number of multiples of 1000 steps that will be tried before
-!   abandoning a path.  If absent, NUMRR is taken as 1.
-!
-! RECALL is used to retrack certain homotopy paths.  It's use assumes
-!   BPLP contains the Bezout number (which is not recalculated),
-!   SCALE_FACTORS contains the variable unscaling factors, and that
-!   IFLAG2(1:BPLP) exists.  The Ith homotopy path is retracked if
-!   IFLAG2(I) = -2, and skipped otherwise.
-!
-! NO_SCALING indicates that the target polynomial is not to be scaled.
-!   Scaling is done by default when NO_SCALING is absent.
-!
-! USER_F_DF indicates (when present) that the user is providing a subroutine
-!   TARGET_SYSTEM_USER to evaluate the (complex) target system F(XC) and
-!   its (complex) N x N Jacobian matrix DF(XC).  XC(1:N+1) is in
-!   complex projective coordinates, and the homogeneous coordinate XC(N+1)
-!   is explicitly eliminated from F(XC) and DF(XC) using the projective
-!   transformation (cf. the comments in START_POINTS_PLP).
-!
-!
-! The following objects must be allocated and defined as described in
-! GLOBAL_PLP:
-! 
-! POLYNOMIAL(I)%NUM_TERMS is the number of terms in the Ith component
-!   F_I(X) of the target polynomial system, for I=1,...,N.
-!
-! POLYNOMIAL(I)%TERM(J)%COEF is the coefficient of the Jth term in the Ith
-!   component of the target polynomial system, for J=1,...,NUMT(I), and
-!   I=1,...,N.
-!
-! POLYNOMIAL(I)%TERM(J)%DEG(K) is the degree of the Kth variable in the
-!   Jth term of the Ith component of the target polynomial system, for
-!   K=1,...,N, J=1,...NUMT(I), and I=1,...,N.
-!
-! PARTITION_SIZES(I) is the number of sets in the Ith component
-!   partition P(I), for I=1,...,N.
-!
-! PARTITION(I)%SET(J)%NUM_INDICES is the number of indices stored in the
-!   Jth set S(I,J) of the Ith component partition P(I), for
-!   J=1,...,PARTITION_SIZES(I), and I=1,...,N.
-!
-! PARTITION(I)SET(J)%INDEX(K) is the index of the Kth variable stored
-!   in the Jth set S(I,J) of the Ith component partition P(I).
-!
-!
-! On output:
-!
-! BPLP is the generalized Bezout number corresponding to the
-!   partitioned linear product (PLP) formulation defined by the system
-!   partition P.  This is the number of paths tracked and the number of
-!   roots returned (counting multiplicity).
-!
-! IFLAG1
-!   = 0  for a normal return.
-!
-!   = -1 if either POLYNOMIAL or PARTITION was improperly allocated.
-!
-!   = -2 if any POLYNOMIAL(I)%TERM(J)%DEG(K) is less than zero.
-!
-!   = -3 if F_I(X) = CONSTANT for some I.
-!
-!   = -4 if SUM_{J=1}^{PARTITION_SIZES(I)} 
-!          PARTITION(I)SET(J)%NUM_INDICES /= N, for some I.
-! 
-!   = -5 if UNION_{J=1}^{PARTITION_SIZES}
-!               S(I,J) /= {1,2,...,N-1,N}, for some I.
-!
-!   = -6 if the optional argument RECALL was present but any of BPLP
-!        or the arrays ARCLEN, IFLAG2, LAMBDA, NFE, ROOTS are
-!        inconsistent with the previous call to POLSYS_PLP.
-!
-!   = -7 if the array SCALE_FACTORS is too small.
-!
-! IFLAG2(1:BPLP) is an integer array which returns information about
-!   each path tracked.  Precisely, for each path I that was tracked,
-!   IFLAG2(I):
-!   = 1 + 10*C, where C is the cycle number of the path, for a normal return.
-!
-!   = 2 if the specified error tolerance could not be met.  Increase
-!       TRACKTOL and rerun.
-!
-!   = 3 if the maximum number of steps allowed was exceeded.  To track
-!       the path further, increase NUMRR and rerun the path.
-!
-!   = 4 if the Jacobian matrix does not have full rank.  The algorithm has
-!       failed (the zero curve of the homotopy map cannot be followed any
-!       further).
-!
-!   = 5 if the tracking algorithm has lost the zero curve of the homotopy
-!       map and is not making progress.  The error tolerances TRACKTOL and
-!       FINALTOL were too lenient.  The problem should be restarted with
-!       smaller error tolerances.
-!
-!   = 6 if the normal flow Newton iteration in STEPNX or ROOT_PLP failed
-!       to converge.  The error error tolerances TRACKTOL or FINALTOL may
-!       be too stringent.
-!
-!   = 7 if ROOT_PLP failed to find a root in 10*NUMRR iterations.
-!
-! ARCLEN(I) is the approximate arc length of the Ith path, for I=1,...,BPLP.
-!
-! LAMBDA(I), if MOD(IFLAG2(I),10) = 1, contains an error estimate of
-!   the normalized residual of the scaled, transformed polynomial
-!   system of equations at the scaled, transformed root for the Ith path
-!   (LAMBDA for this path is assumed to be 1). Otherwise LAMBDA(I) is the
-!   final value of the homotopy parameter lambda on the Ith path, for
-!   I=1,...,BPLP.
-!
-! ROOTS(1:N,I) are the complex roots (untransformed and unscaled) of
-!   the target polynomial corresonding to the Ith path, for I=1,...,BPLP.
-!
-! ROOTS(N+1,I) is the homogeneous variable of the target polynomial
-!   system in complex projective space corresponding to ROOTS(1:N,I).
-!
-! NFE(I) is the number of Jacobian matrix evaluations required to track
-!   the Ith path, for I=1,...,BPLP.
-!
-! SCALE_FACTORS(1:N) contains the unscaling factors for the variables X(I).
-!   These are needed only on a recall when scaling was done on the original
-!   call to POLSYS_PLP (NO_SCALING was absent).
-
-
-USE GLOBAL_PLP
-
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-REAL (KIND=R8), INTENT(IN):: TRACKTOL, FINALTOL
-REAL (KIND=R8), INTENT(IN OUT):: SINGTOL
-REAL (KIND=R8), DIMENSION(8), INTENT(IN OUT):: SSPAR
-INTEGER, INTENT(IN OUT):: BPLP, IFLAG1
-INTEGER, DIMENSION(:), POINTER:: IFLAG2
-REAL (KIND=R8), DIMENSION(:), POINTER:: ARCLEN, LAMBDA
-COMPLEX (KIND=R8), DIMENSION(:,:), POINTER:: ROOTS
-INTEGER, DIMENSION(:), POINTER:: NFE
-REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: SCALE_FACTORS
-INTEGER, OPTIONAL, INTENT(IN):: NUMRR
-LOGICAL, OPTIONAL, INTENT(IN):: RECALL, NO_SCALING, USER_F_DF
-
-INTERFACE
-  SUBROUTINE STEPNX(N,NFE,IFLAG,START,CRASH,HOLD,H,RELERR,   &
-      ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-    USE REAL_PRECISION
-    INTEGER, INTENT(IN):: N
-    INTEGER, INTENT(IN OUT):: NFE,IFLAG
-    LOGICAL, INTENT(IN OUT):: START,CRASH
-    REAL (KIND=R8), INTENT(IN OUT):: HOLD,H,RELERR,ABSERR,S,RHOLEN, &
-      SSPAR(8)
-    REAL (KIND=R8), DIMENSION(:), INTENT(IN):: A
-    REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: Y,YP,YOLD,YPOLD, &
-      TZ,W,WP
-    REAL (KIND=R8), DIMENSION(:), ALLOCATABLE, SAVE:: Z0,Z1
-  END SUBROUTINE STEPNX
-END INTERFACE
-
-! Local variables.
-
-INTEGER:: BTEMP, I, IFLAG, II, ITER, J, JJ, K, KK, LIMIT, MAXPS, &
-  MAXT, NNFE, NUM_RERUNS, ROOT_COUNT
-INTEGER, SAVE:: BPLP_SAVE
-INTEGER, DIMENSION(N):: CHECK_PAR, DLEX_NUM, DLEX_SAVE, FLEX_NUM, FLEX_SAVE
-INTEGER, DIMENSION(2*N+1):: PIVOT
-REAL (KIND=R8):: ABSERR, H, HOLD, RELERR, RHOLEN, S
-REAL (KIND=R8), DIMENSION(2*N):: A, DRHOL, RHOV, Z
-REAL (KIND=R8), DIMENSION(2*N+1):: Y, YP, YOLD, YOLDS, YPOLD, TZ, W, WP
-REAL (KIND=R8), DIMENSION(3*(2*N+1)):: ALPHA
-REAL (KIND=R8), DIMENSION(2*N+1,12):: YS
-REAL (KIND=R8), DIMENSION(N,N):: RAND_MAT
-REAL, DIMENSION(N,N):: RANDNUMS
-REAL (KIND=R8), DIMENSION(N+1,N):: MAT
-REAL (KIND=R8), DIMENSION(2*N,2*N):: DRHOX
-REAL (KIND=R8), DIMENSION(2*N,2*N+2):: QR
-COMPLEX (KIND=R8), DIMENSION(N-1):: TAU
-COMPLEX (KIND=R8), DIMENSION(N):: B, F, G, V
-COMPLEX (KIND=R8), DIMENSION(N+1):: PROJ_COEF, XC
-COMPLEX (KIND=R8), DIMENSION(N,N):: AA
-COMPLEX (KIND=R8), DIMENSION(N,N+1):: DF, DG
-COMPLEX (KIND=R8), DIMENSION(:,:), ALLOCATABLE:: TEMP1G, TEMP2G
-LOGICAL:: CRASH, NONSING, START
-
-! Begin input data check.
-
-IFLAG1 = 0  ! Normal return.
-
-! Check that dimensions are valid.
-IF ((N <= 0) .OR. (SIZE(POLYNOMIAL) /= N)          & 
-             .OR. ANY((/(NUMT(I),I=1,N)/) <= 0)    &
-             .OR. (SIZE(PARTITION) /= N)           &
-             .OR. ANY(PARTITION_SIZES <= 0)) THEN
-  IFLAG1 = -1
-  RETURN
-END IF
-DO I=1,N
-  IF ((SIZE(POLYNOMIAL(I)%TERM) /= NUMT(I))                   &
-    .OR. (SIZE(PARTITION(I)%SET) /= PARTITION_SIZES(I))       &
-    .OR. ANY((/(NUMV(I,J),J=1,PARTITION_SIZES(I))/) <= 0)) THEN  
-    IFLAG1 = -1
-    RETURN
-  END IF
-END DO
-DO I=1,N
-  DO J=1,NUMT(I)
-    IF (SIZE(POLYNOMIAL(I)%TERM(J)%DEG) /= N + 1) THEN
-      IFLAG1 = -1
-      RETURN
-    END IF
-  END DO
-  DO J=1,PARTITION_SIZES(I)
-    IF (SIZE(PARTITION(I)%SET(J)%INDEX) /= NUMV(I,J)) THEN
-      IFLAG1 = -1
-      RETURN
-    END IF
-  END DO
-END DO
-
-! Check that the target system has no negative powers.
-DO I=1,N
-  DO J=1,NUMT(I)
-    IF (ANY(POLYNOMIAL(I)%TERM(J)%DEG(1:N) < 0)) THEN
-      IFLAG1 = -2
-      RETURN
-    END IF
-  END DO
-END DO
-
-! Check that the target system has no constant-valued components.
-DO I=1,N
-  IF (ALL( (/( SUM(POLYNOMIAL(I)%TERM(J)%DEG(1:N)),   & 
-                                 J=1,NUMT(I) )/) == 0)) THEN
-    IFLAG1 = -3
-    RETURN
-  END IF
-END DO
-
-! Check that the system partition is valid.
-DO I=1,N
-  IF (SUM( (/(NUMV(I,J),J=1,PARTITION_SIZES(I))/) ) /= N) THEN
-    IFLAG1 = -4
-    RETURN
-  END IF
-  CHECK_PAR(1:N) = 0
-  DO J=1,PARTITION_SIZES(I)
-    DO K=1,NUMV(I,J)
-      CHECK_PAR(PAR(I,J,K)) = CHECK_PAR(PAR(I,J,K)) + 1
-    END DO
-  END DO
-  IF (ANY(CHECK_PAR /= 1)) THEN
-    IFLAG1 = -5
-    RETURN
-  END IF
-END DO
-
-! Check consistency on a recall.
-IF (PRESENT(RECALL)) THEN
-  IF ( (BPLP /= BPLP_SAVE) .OR. (SIZE(ARCLEN) < BPLP)              &
-                           .OR. (SIZE(IFLAG2) < BPLP)              &
-                           .OR. (SIZE(LAMBDA) < BPLP)              &
-                           .OR. (SIZE(NFE) < BPLP)                 &
-                           .OR. (SIZE(ROOTS,DIM=2) < BPLP) ) THEN
-    IFLAG1 = -6
-    RETURN
-  END IF
-END IF
-
-! Check SCALE_FACTORS array size.
-IF (SIZE(SCALE_FACTORS) < N) THEN
-  IFLAG1 = -7
-  RETURN
-END IF
-
-! End input data check.
-
-! Initialize the POINTER aguments of POLSYS_PLP.
-MAXT = MAXVAL((/(NUMT(I),I=1,N)/))
-IF ( .NOT. PRESENT(RECALL)) THEN
-  CALL BEZOUT_PLP(N,MAXT,SINGTOL,BPLP)
-  BPLP_SAVE = BPLP  ! Save Bezout number for recall check.
-  IF (ASSOCIATED(ARCLEN)) THEN
-    IF (SIZE(ARCLEN) < BPLP) THEN
-      DEALLOCATE(ARCLEN) ; ALLOCATE(ARCLEN(BPLP))
-    END IF
-  ELSE
-    ALLOCATE(ARCLEN(BPLP))
-  END IF
-  IF (ASSOCIATED(IFLAG2)) THEN
-    IF (SIZE(IFLAG2) < BPLP) THEN
-      DEALLOCATE(IFLAG2) ; ALLOCATE(IFLAG2(BPLP))
-    END IF
-  ELSE
-    ALLOCATE(IFLAG2(BPLP))
-  END IF
-  IFLAG2 = -2
-  IF (ASSOCIATED(NFE)) THEN
-    IF (SIZE(NFE) < BPLP) THEN
-      DEALLOCATE(NFE) ; ALLOCATE(NFE(BPLP))
-    END IF
-  ELSE
-    ALLOCATE(NFE(BPLP))
-  END IF
-  IF (ASSOCIATED(LAMBDA)) THEN
-    IF (SIZE(LAMBDA) < BPLP) THEN
-      DEALLOCATE(LAMBDA) ; ALLOCATE(LAMBDA(BPLP))
-    END IF
-  ELSE
-    ALLOCATE(LAMBDA(BPLP))
-  END IF
-  IF (ASSOCIATED(ROOTS)) THEN
-    IF (SIZE(ROOTS,DIM=2) < BPLP .OR. SIZE(ROOTS,DIM=1) < N + 1) THEN
-      DEALLOCATE(ROOTS) ; ALLOCATE(ROOTS(N+1,BPLP))
-    END IF
-  ELSE
-    ALLOCATE(ROOTS(N+1,BPLP))
-  END IF
-END IF
-
-! Allocate storage for the start system.
-DO I=1,N
-  DO J=1,PARTITION_SIZES(I)
-    ALLOCATE(PARTITION(I)%SET(J)%START_COEF(NUMV(I,J)))
-  END DO
-END DO
-
-! Allocate working space for homotopy map derivative calculation.
-MAXPS = MAXVAL(PARTITION_SIZES)
-ALLOCATE(TEMP1G(N,MAXPS), TEMP2G(N,MAXPS))
-
-! Get real random numbers uniformly distributed in [-1,-1/2] union
-! [1/2,1] for RAND_MAT, which is used in SINGSYS_PLP. 
-CALL RANDOM_NUMBER(HARVEST=RANDNUMS)
-RANDNUMS = RANDNUMS - 0.5 + SIGN(0.5,RANDNUMS - 0.5)
-RAND_MAT = REAL(RANDNUMS,KIND=R8)
-
-! Set default value for singularity threshold SINGTOL in SINGSYS_PLP.
-IF (SINGTOL <= REAL(N,KIND=R8)*EPSILON(1.0_R8))  &
-    SINGTOL = SQRT(EPSILON(1.0_R8))
-
-! Scale the target polynomial system as requested.
-IF (PRESENT(NO_SCALING)) THEN
-  SCALE_FACTORS = 0.0_R8
-ELSE IF (.NOT. PRESENT(RECALL)) THEN
-  CALL SCALE_PLP
-END IF
-
-! Initialize the start system for the homotopy map.
-CALL INIT_PLP
-
-! Set main loop initial values.
-FLEX_NUM(1:N-1) = 1
-FLEX_NUM(N) = 0
-FLEX_SAVE = 0
-ROOT_COUNT = 0
-IF (PRESENT(NUMRR)) THEN
-  NUM_RERUNS = MAX(NUMRR,1)
-ELSE
-  NUM_RERUNS = 1
-END IF
-
-! Main loop over all possible lexicographic vectors FLEX_NUM(1:N)
-! corresponding to linear factors.
-
-MAIN_LOOP: &
-DO 
-
-  DO J=N,1,-1
-    IF (FLEX_NUM(J) < PARTITION_SIZES(J)) THEN
-      K = J
-      EXIT      
-    END IF
-  END DO 
-  FLEX_NUM(K) = FLEX_NUM(K) + 1
-  IF (K + 1 <= N) FLEX_NUM(K+1:N) = 1
-
-  ! Check if the subsystem of the start system defined by the
-  ! lexicographic vector FLEX_NUM is singular. 
-  CALL SINGSYS_PLP(N,FLEX_NUM,FLEX_SAVE,SINGTOL,RAND_MAT,MAT,NONSING)
-
-  ! If the subsystem is nonsingular, track a path.
-  NONSING_START_POINT: IF (NONSING) THEN
-    BTEMP = PRODUCT( (/(SD(I,FLEX_NUM(I)),I=1,N)/) )
-    DLEX_NUM(1:N-1) = 1
-    DLEX_NUM(N) = 0
-    DLEX_SAVE = 0
-  
-    ! Cycle through all lexicographic vectors DLEX_NUM(1:N) corresponding
-    ! to roots of unity, defined by the set degrees specified in
-    ! (/(SD(I,FLEX_NUM(I)),I=1,N)/).
-    SD_LEX_LOOP: DO II=1,BTEMP
-      DO JJ=N,1,-1
-        IF (DLEX_NUM(JJ) < SD(JJ,FLEX_NUM(JJ))) THEN
-          KK = JJ
-          EXIT
-        END IF
-      END DO
-      DLEX_NUM(KK) = DLEX_NUM(KK) + 1
-      IF (KK + 1 <= N) DLEX_NUM(KK+1:N) = 1
-      ROOT_COUNT = ROOT_COUNT + 1
-      IF (IFLAG2(ROOT_COUNT) /= -2) CYCLE SD_LEX_LOOP
-  
-      ! Get the start point for the homotopy path defined by FLEX_NUM and
-      ! DLEX_NUM.
-      CALL START_POINTS_PLP
-  
-      NNFE = 0
-      IFLAG = -2
-      Y(1) = 0.0_R8 ; Y(2:2*N+1) = Z(1:2*N)
-      YP(1) = 1.0_R8 ;  YP(2:2*N+1) = 0.0_R8
-      YOLD = Y ;  YPOLD = YP
-      HOLD = 1.0_R8 ; H = 0.1_R8
-      S = 0.0_R8
-      LIMIT = 1000*NUM_RERUNS
-      START = .TRUE.
-      CRASH = .FALSE.
-  
-      ! Track the homotopy path.
-  
-      TRACKER: DO ITER=1,LIMIT
-        IF (Y(1) < 0.0_R8) THEN
-          IFLAG = 5
-          EXIT TRACKER
-        END IF
-  
-        ! Set different error tolerance if the trajectory Y(S) has any high
-        ! curvature components.
-        RELERR = TRACKTOL
-        ABSERR = TRACKTOL
-        IF (ANY(ABS(YP - YPOLD) > 10.0_R8*HOLD)) THEN
-          RELERR = FINALTOL
-          ABSERR = FINALTOL
-        END IF
-  
-        ! Take a step along the homotopy zero curve.
-        CALL STEP_PLP
-        IF (IFLAG > 0) EXIT TRACKER
-        IF (Y(1) >= .97_R8) THEN
-          RELERR = FINALTOL
-          ABSERR = FINALTOL
-  
-          ! Enter end game.
-          CALL ROOT_PLP
-          EXIT TRACKER
-        END IF
-  
-        ! D LAMBDA/DS >= 0 necessarily.  This condition is forced here.
-        IF (YP(1) < 0.0_R8) THEN
-  
-          ! Reverse the tangent direction so D LAMBDA/DS = YP(1) > 0.
-          YP = -YP
-          YPOLD = YP
-  
-          ! Force STEPNX to use the linear predictor for the next step only.
-          START = .TRUE.
-        END IF
-      END DO TRACKER
-  
-      ! Set error flag if limit on number of steps exceeded.
-      IF (ITER >= LIMIT) IFLAG = 3
-  
-      ARCLEN(ROOT_COUNT) = S
-      NFE(ROOT_COUNT) = NNFE
-      IFLAG2(ROOT_COUNT) = IFLAG
-      LAMBDA(ROOT_COUNT) = Y(1)
-  
-      ! Convert from real to complex arithmetic.
-      XC(1:N) = CMPLX(Y(2:2*N:2),Y(3:2*N+1:2),KIND=R8)
-  
-      ! Untransform and unscale solutions.
-      CALL OUTPUT_PLP
-      ROOTS(1:N,ROOT_COUNT) = XC(1:N)
-      ROOTS(N+1,ROOT_COUNT) = XC(N+1)
-
-    END DO SD_LEX_LOOP
-  END IF NONSING_START_POINT
-
-  IF (ALL(FLEX_NUM == PARTITION_SIZES)) EXIT MAIN_LOOP
-
-END DO MAIN_LOOP
-
-
-! Clean up working storage in STEPNX.
-IFLAG = -42
-CALL STEPNX (2*N,NNFE,IFLAG,START,CRASH,HOLD,H,RELERR, &
-  ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-
-! Deallocate the storage for the start system and working storage.
-DO I=1,N
-  DO J=1,PARTITION_SIZES(I)
-    DEALLOCATE(PARTITION(I)%SET(J)%START_COEF)
-  END DO
-END DO
-DEALLOCATE(TEMP1G,TEMP2G)
-RETURN
-
-CONTAINS
-
-                                                                     !!!
-SUBROUTINE SCALE_PLP
-! SCALE_PLP scales the complex coefficients of a polynomial system of N
-! equations in N unknowns, F(X)=0, where the Jth term of the Ith equation
-! looks like 
-!
-!    C(I,J) * X(1)**D(I,J,1) ... X(N)**D(I,J,N).
-!
-! The Ith equation is scaled by 10**FACE(I).  The Kth variable is scaled
-! by 10**FACV(K).  In other words, X(K)=10**FACV(K)*Y(K), where Y solves
-! the scaled equation.  The scaled equation has the same form as the
-! original, except that CSCL(I,J) replaces POLYNOMIAL(I)%TERM(J)%COEF,
-! where 
-!
-! CSCL(I,J)=C(I,J)*10**(FACE(I)+FACV(1)*D(I,J,1)+...+FACV(N)*D(I,J,N)).
-!
-! The criterion for generating FACE and FACV is that of minimizing the
-! sum of squares of the exponents of the scaled coefficients.  It turns
-! out that this criterion reduces to solving a single linear system,
-! ALPHA*X=BETA, as defined in the code below.  See Meintjas and Morgan,
-! "A methodology for solving chemical equilibrium problems," General
-! Motors Research Laboratories Technical Report GMR-4971.
-!
-! Calls the LAPACK routines DGEQRF, DORMQR, and the BLAS routines
-! DTRSV and IDAMAX.
-!
-! On exit:
-!
-! SCALE_FACTORS(K) = FACV(K) is the scale factor for X(K), K=1,...,N.
-!  Precisely, the unscaled solution
-!  X(K) = 10**FACV(K) * (computed scaled solution).
-!
-! POLYNOMIAL(I)%TERM(J)%COEF = CSCL(I,J) is the scaled complex
-!  coefficient, for J=1,...,NUMT(I), and I=1,...,N.
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: COUNT, I, ICMAX, IRMAX, J, K, L, LENR
-INTEGER, DIMENSION(N):: NNUMT
-INTEGER, DIMENSION(N,MAXT,N):: DDEG 
-REAL (KIND=R8):: DUM, RTOL, TUM
-REAL (KIND=R8), DIMENSION(:), POINTER:: FACE, FACV
-REAL (KIND=R8), DIMENSION(2*N), TARGET:: BETA, RWORK, XWORK
-REAL (KIND=R8), DIMENSION(2*N,2*N):: ALPHA
-REAL (KIND=R8), DIMENSION(N,MAXT):: CMAG
-
-INTERFACE
-  INTEGER FUNCTION IDAMAX(N,X,STRIDE)
-    USE REAL_PRECISION
-    INTEGER:: N,STRIDE
-    REAL (KIND=R8), DIMENSION(N):: X
-  END FUNCTION IDAMAX
-END INTERFACE
-
-LENR = N*(N+1)/2
-SCALE_FACTORS(1:N) = 0.0_R8 ! This corresponds to no scaling.
-
-! Delete exact zero coefficients, just for scaling.
-NNUMT = 0
-DO I=1,N
-  COUNT = 0
-  DO J=1,NUMT(I)
-    IF (ABS(C(I,J)) > 0.0_R8) THEN
-      COUNT = COUNT + 1
-      NNUMT(I) = NNUMT(I) + 1
-      CMAG(I,COUNT) = LOG10(ABS(C(I,J)))
-      DDEG(I,COUNT,1:N) = (/(D(I,J,K),K=1,N)/)
-    END IF
-  END DO
-END DO
-
-! Generate the matrix ALPHA.
-ALPHA(1:N,1:N) = 0.0_R8
-DO I=1,N
-  ALPHA(I,I) = REAL(NNUMT(I),KIND=R8)
-END DO
-DO I=1,N
-  ALPHA(N+1:2*N,I) = REAL(SUM(DDEG(I,1:NNUMT(I),1:N),DIM=1),KIND=R8)
-END DO
-DO L=1,N
-  DO K=1,L
-    ICMAX = 0
-    DO I=1,N
-      ICMAX = ICMAX + DOT_PRODUCT(DDEG(I,1:NNUMT(I),L),DDEG(I,1:NNUMT(I),K))
-    END DO
-    ALPHA(N+L,N+K) = REAL(ICMAX,KIND=R8)
-    ALPHA(N+K,N+L) = ALPHA(N+L,N+K)
-  END DO
-END DO
-ALPHA(1:N,N+1:2*N) = TRANSPOSE(ALPHA(N+1:2*N,1:N))
-
-! Compute the QR-factorization of the matrix ALPHA.
-CALL DGEQRF(2*N,2*N,ALPHA,2*N,XWORK,BETA,2*N,I)
-
-! Check for ill-conditioned scaling matrix.
-IRMAX = 1
-ICMAX = 1
-DO J=2,N
-  I = IDAMAX(J,ALPHA(1,J),1)
-  IF (ABS(ALPHA(I,J)) > ABS(ALPHA(IRMAX,ICMAX))) THEN 
-    IRMAX = I
-    ICMAX = J
-  END IF
-END DO
-RTOL = ABS(ALPHA(IRMAX,ICMAX))*EPSILON(1.0_R8)*REAL(N,KIND=R8)
-DO I=1,N
-  IF (ABS(ALPHA(I,I)) < RTOL) THEN  ! ALPHA is ill conditioned.
-    RETURN  ! Default to no scaling at all.
-  END IF
-END DO
-
-! Generate the column BETA.
-DO K=1,N
-  BETA(K) = -SUM(CMAG(K,1:NNUMT(K)))
-  TUM = 0.0_R8
-  DO I=1,N
-    TUM = TUM + SUM(CMAG(I,1:NNUMT(I)) * REAL(DDEG(I,1:NNUMT(I),K),KIND=R8))
-  END DO
-  BETA(N+K) = -TUM
-END DO
-
-! Solve the linear system ALPHA*X=BETA.
-CALL DORMQR('L','T',2*N,1,2*N-1,ALPHA,2*N,XWORK,BETA,2*N,RWORK,2*N,I)  
-CALL DTRSV('U','N','N',2*N,ALPHA,2*N,BETA,1) 
-
-! Generate FACE, FACV, and the scaled coefficients CSCL(I,J).
-FACE => BETA(1:N)
-FACV => BETA(N+1:2*N)
-DO I=1,N
-  DO J=1,NUMT(I)
-    DUM = ABS(C(I,J))
-    IF (DUM /= 0.0) THEN
-      TUM = FACE(I) + LOG10(DUM) + DOT_PRODUCT(FACV(1:N), &
-                                   POLYNOMIAL(I)%TERM(J)%DEG(1:N))
-      POLYNOMIAL(I)%TERM(J)%COEF = (10.0_R8**TUM) * (C(I,J)/DUM)
-    ENDIF
-  END DO
-END DO
-
-SCALE_FACTORS(1:N) = FACV(1:N)
-RETURN
-END SUBROUTINE SCALE_PLP
-
-                                                                     !!!
-SUBROUTINE INIT_PLP
-! INIT_PLP homogenizes the homotopy map, and harvests random complex
-! numbers which define the start system and the projective transformation.
-!
-! On exit:
-!
-! POLYNOMIAL(I)%TERM(J)%DEG(N+1) is the degree of the homogeneous variable
-!  in the Jth term of the Ith component of the target system.
-!
-! PARTITION(I)%SET(J)%START_COEF(K) is the coefficient of X(PAR(I,J,K)) in
-!  the linear factor L(I,J).  (L(I,J) is defined in GLOBAL_PLP.)  
-!
-! PROJ_COEF(I) is the coefficient of X(I) in the projective transformation,
-!  when I=1,...,N, and the constant term in the projective transformation,
-!  when I=N+1. 
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: COUNT, I, J, K, SEED_SIZE
-INTEGER, DIMENSION(:), ALLOCATABLE:: SEED
-REAL, DIMENSION(N*N+N+1,2):: RANDS
-REAL (KIND=R8), DIMENSION(N*N+N+1,2):: RANDSR8
-
-! Construct the homogenization of the homotopy map.  Note: 
-! Homogenization of the start system is implicit.
-DO I=1,N
-  DO J=1,NUMT(I)
-    POLYNOMIAL(I)%TERM(J)%DEG(N+1) = SUM((/(SD(I,K),K=1, &
-      PARTITION_SIZES(I))/)) - SUM(POLYNOMIAL(I)%TERM(J)%DEG(1:N))
-  END DO
-END DO
-
-! Get the random coefficients START_COEF which define the start system
-! and the random coefficients PROJ_COEF which define the projective
-! transformation.
-CALL RANDOM_SEED(SIZE=SEED_SIZE)
-ALLOCATE(SEED(SEED_SIZE))
-SEED(1:SEED_SIZE) = 32749
-CALL RANDOM_SEED(PUT=SEED(1:SEED_SIZE))
-CALL RANDOM_NUMBER(HARVEST=RANDS)
-RANDS = 2.0 * RANDS - 1.0
-RANDSR8 = REAL(RANDS,KIND=R8)
-COUNT = 1
-DO I=1,N
-  DO J=1,PARTITION_SIZES(I)
-    DO K=1,NUMV(I,J)
-      PARTITION(I)%SET(J)%START_COEF(K) = CMPLX(RANDSR8(COUNT,1),  &
-        RANDSR8(COUNT,2),KIND=R8)
-      COUNT = COUNT + 1
-    END DO
-  END DO
-END DO
-PROJ_COEF(1:N+1) = CMPLX(RANDSR8(COUNT:COUNT+N,1),  &
-  RANDSR8(COUNT:COUNT+N,2),KIND=R8)
-
-DEALLOCATE(SEED)
-RETURN
-END SUBROUTINE INIT_PLP
-
-                                                                     !!!
-SUBROUTINE START_POINTS_PLP
-! START_POINTS_PLP finds a starting point for the homotopy map
-! corresponding to the lexicographic vector FLEX_NUM (defining the
-! variable sets) and the lexicographic vector DLEX_NUM (defining the
-! particular start point among all those defined by FLEX_NUM).  The
-! (complex) start point z is the solution to a nonsingular linear system
-! AA z = B, defined by (cf. the notation in the module GLOBAL_PLP)
-!
-! L(1,FLEX_NUM(1)) - R(DLEX_NUM(1)-1,SD(1,FLEX_NUM(1))) * X(N+1) = 0,
-! .
-! .
-! .
-! L(N,FLEX_NUM(N)) - R(DLEX_NUM(N)-1,SD(N,FLEX_NUM(N))) * X(N+1) = 0,
-! X(N+1) = SUM_{J=1}^N PROJ_COEF(J)*X(J) + PROJ_COEF(N+1),
-!
-! where the last equation is the projective transformation, X(N+1) is
-! the homogeneous coordinate, and R(K,M)=e**(i*2*PI*K/M) is an Mth root
-! of unity.  The homogeneous variable X(N+1) is explicitly eliminated,
-! resulting in an N x N complex linear system for z=(X(1),...,X(N)).
-!
-! START_POINTS_PLP calculates a start point in an efficient way:  For each
-! fixed lexicographic number LEX_NUM, the routine reuses, if possible,
-! previous Householder reflections in the LQ decomposition of AA.
-!
-! Calls the LAPACK routines ZLARFG, ZLARFX, the BLAS routine ZTRSV, and the
-! internal function ROOT_OF_UNITY. 
-!
-! On exit:
-!
-! Z(1:2N) is a real vector representing the (complex) start point z.
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: I, J, K
-COMPLEX (KIND=R8):: ROOT, WORK(1)
-
-! (Re)set the coefficient matrix AA, and set B.
-DO I=1,N
-  IF (DLEX_SAVE(I) /= DLEX_NUM(I)) THEN
-    DLEX_SAVE(I+1:N) = 0
-    DO J=1,N
-      ROOT = ROOT_OF_UNITY(DLEX_NUM(J)-1,SD(J,FLEX_NUM(J)))
-      B(J) = ROOT * PROJ_COEF(N+1)
-      IF (J >= I) THEN
-        AA(J,1:N) = (0.0_R8,0.0_R8)
-        K = NUMV(J,FLEX_NUM(J))
-        AA(J,PARTITION(J)%SET(FLEX_NUM(J))%INDEX(1:K)) = &
-          PARTITION(J)%SET(FLEX_NUM(J))%START_COEF(1:K)
-        AA(J,1:N) = AA(J,1:N) - PROJ_COEF(1:N) * ROOT
-      END IF
-    END DO
-    EXIT
-  END IF
-END DO
-
-! Special code for the case N=1.
-IF (N == 1) THEN
-  WORK(1) = B(1)/AA(1,1)
-  Z(1) = REAL(WORK(1))
-  Z(2) = AIMAG(WORK(1))
-  DLEX_SAVE = DLEX_NUM
-  RETURN
-END IF
-
-! Update the LQ factorization of AA.
-IF (DLEX_SAVE(1) /= DLEX_NUM(1)) THEN
-  AA(1,1:N) = CONJG(AA(1,1:N))
-  CALL ZLARFG(N,AA(1,1),AA(1,2:N),1,TAU(1))
-END IF
-DO I=2,N
-  IF (DLEX_SAVE(I) /= DLEX_NUM(I)) THEN
-    DO J=1,I-1
-      V(J) = (1.0_R8,0.0_R8)
-      V(J+1:N) = AA(J,J+1:N)
-      CALL ZLARFX('R',1,N-J+1,V(J:N),TAU(J),AA(I,J:N),1,WORK)
-    END DO
-    IF (I < N) THEN
-      AA(I,I:N) = CONJG(AA(I,I:N))
-      CALL ZLARFG(N-I+1,AA(I,I),AA(I,I+1:N),1,TAU(I))
-    END IF
-  END IF
-END DO
-DLEX_SAVE = DLEX_NUM
-
-! Solve the linear system AA Z = B, by solving L Q Z = B.
-
-! L W = B.
-CALL ZTRSV('L','N','N',N,AA(1:N,1:N),N,B(1:N),1)
-! Z = CONJG(Q') W.
-DO I=N-1,1,-1
-  V(I) = (1.0_R8,0.0_R8)
-  V(I+1:N) = AA(I,I+1:N)
-  CALL ZLARFX('L',N-I+1,1,V(I:N),TAU(I),B(I:N),N,WORK)
-END DO
-
-! Convert the complex start point to a real vector.
-Z(1:2*N:2) = REAL(B)
-Z(2:2*N:2) = AIMAG(B)
-RETURN
-END SUBROUTINE START_POINTS_PLP
-
-                                                                     !!!
-COMPLEX (KIND=R8) FUNCTION ROOT_OF_UNITY(K,N) RESULT(RU)
-! RU = e**(i*2*PI*K/N).
-  IMPLICIT NONE
-  INTEGER:: K, N
-  REAL (KIND=R8):: ANGLE
-  ANGLE = 2.0_R8*PI*(REAL(K,KIND=R8)/REAL(N,KIND=R8))
-  RU = CMPLX(COS(ANGLE),SIN(ANGLE),KIND=R8)
-  RETURN
-END FUNCTION ROOT_OF_UNITY
-
-                                                                     !!!
-SUBROUTINE STEP_PLP
-
-! Driver for reverse call external subroutine STEPNX from HOMPACK90.
-
-IMPLICIT NONE
-INTEGER:: FAIL=0,IFLAGS
-STEP: DO
-  CALL STEPNX(2*N,NNFE,IFLAG,START,CRASH,HOLD,H,RELERR, &
-    ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-  IF (CRASH) THEN
-    IFLAG = 2
-    EXIT
-  END IF
-  IFLAGS = IFLAG
-  SELECT CASE (IFLAGS)
-    CASE (-2)      ! Successful step.
-      EXIT
-    CASE (-12)     ! Compute tangent vector.
-      RHOLEN = 0.0_R8
-      CALL TANGENT_PLP
-      IF (IFLAG == 4) THEN
-        IFLAG = IFLAGS - 100
-        FAIL = FAIL + 1
-      ENDIF
-    CASE (-32,-22) ! Compute tangent vector and Newton step.
-      RHOLEN = -1.0_R8
-      CALL TANGENT_PLP(NEWTON_STEP=.TRUE.)
-      IF (IFLAG == 4) THEN
-        IFLAG = IFLAGS - 100
-        FAIL = FAIL + 1
-      ENDIF
-    CASE (4,6) ! STEPNX failed.
-      EXIT
-  END SELECT
-  IF (FAIL == 2) THEN
-    IFLAG = 4 ; RETURN
-  ENDIF
-END DO STEP
-RETURN
-END SUBROUTINE STEP_PLP
-
-                                                                     !!!
-SUBROUTINE TANGENT_PLP(NEWTON_STEP)
-! This subroutine builds the Jacobian matrix of the homotopy map,
-! computes a QR decomposition of that matrix, and then calculates the
-! (unit) tangent vector and (if NEWTON_STEP is present) the Newton
-! step.
-!
-! On input:
-!
-! NEWTON_STEP is a logical optional argument which, if present,
-!    indicates that the Newton step is also to be calculated.
-!
-! RHOLEN < 0 if the norm of the homotopy map evaluated at
-!    (LAMBDA, X) is to be computed.  If  RHOLEN >= 0  the norm is not
-!    computed and RHOLEN is not changed.
-!
-! W(1:2*N+1) = current point (LAMBDA(S), X(S)).
-!
-! YPOLD(1:2*N+1) = unit tangent vector at previous point on the zero
-!    curve of the homotopy map.
-!
-! On output:
-!
-! RHOLEN = ||RHO(LAMBDA(S), X(S))|| if  RHOLEN < 0  on input.
-!    Otherwise RHOLEN is unchanged.
-!
-! WP(1:2*N+1) = dW/dS = unit tangent vector to integral curve of
-!    d(homotopy map)/dS = 0  at  W(S) = (LAMBDA(S), X(S)) .
-!
-! TZ = the Newton step = -(pseudo inverse of  (d RHO(W(S))/d LAMBDA ,
-!    d RHO(W(S))/dX)) * RHO(W(S)) .
-!
-! IFLAG  is unchanged, unless the QR factorization detects a rank < N,
-!    in which case the tangent and Newton step vectors are not computed
-!    and TANGENT_PLP returns with  IFLAG = 4 .
-!
-!
-! Calls  DGEQPF, DNRM2, DORMQR, RHO.
-
-IMPLICIT NONE
-LOGICAL, INTENT(IN), OPTIONAL:: NEWTON_STEP
-REAL (KIND=R8):: LAMBDA, SIGMA, WPNORM
-INTEGER:: I, J, K
-
-INTERFACE
-  FUNCTION DNRM2(N,X,STRIDE)
-    USE REAL_PRECISION
-    INTEGER:: N,STRIDE
-    REAL (KIND=R8):: DNRM2,X(N)
-  END FUNCTION DNRM2
-END INTERFACE
-
-! Compute the Jacobian matrix, store it and homotopy map in QR.
-!
-!  QR = ( D RHO(LAMBDA,X)/D LAMBDA , D RHO(LAMBDA,X)/DX ,
-!                                              RHO(LAMBDA,X) )  .
-!
-! Force LAMBDA >= 0 for tangent calculation.
-IF (W(1) < 0.0_R8) THEN
-  LAMBDA = 0.0_R8
-ELSE
-  LAMBDA = W(1)
-END IF
-
-! RHO(W) evaluates the homotopy map and its Jacobian matrix at W,
-! leaving the results in the arrays RHOV, DRHOL, and DRHOX.
-CALL RHO(LAMBDA,W(2:2*N+1))
-QR(1:2*N,1) = DRHOL(1:2*N)
-QR(1:2*N,2:2*N+1) = DRHOX(1:2*N,1:2*N)
-QR(1:2*N,2*N+2) = RHOV(1:2*N)
-
-! Compute the norm of the homotopy map if it was requested.
-IF (RHOLEN < 0.0_R8) RHOLEN = DNRM2(2*N,QR(:,2*N+2),1)
-
-! Reduce the Jacobian matrix to upper triangular form.
-PIVOT = 0
-CALL DGEQPF(2*N,2*N+1,QR,2*N,PIVOT,WP,ALPHA,K)
-IF (ABS(QR(2*N,2*N)) <= ABS(QR(1,1))*EPSILON(1.0_R8)) THEN 
-  IFLAG = 4
-  RETURN
-ENDIF
-
-! Apply Householder reflections to last column of QR (which contains
-! RHO(A,W)).
-CALL DORMQR('L','T',2*N,1,2*N-1,QR,2*N,WP,QR(:,2*N+2),2*N,  &
-  ALPHA, 3*(2*N+1),K)
-
-! Compute kernel of Jacobian matrix, yielding WP=dW/dS.
-TZ(2*N+1) = 1.0_R8
-DO I=2*N,1,-1
-  J = I + 1
-  TZ(I) = -DOT_PRODUCT(QR(I,J:2*N+1),TZ(J:2*N+1))/QR(I,I)
-END DO
-WPNORM = DNRM2(2*N+1,TZ,1)
-WP(PIVOT) = TZ/WPNORM
-IF (DOT_PRODUCT(WP,YPOLD) < 0.0_R8) WP = -WP
-
-! WP is the unit tangent vector in the correct direction.
-IF (.NOT. PRESENT(NEWTON_STEP)) RETURN
-
-! Compute the minimum norm solution of [d RHO(W(S))] V = -RHO(W(S)).
-! V is given by  P - (P,Q)Q  , where P is any solution of
-! [d RHO] V = -RHO  and Q is a unit vector in the kernel of [d RHO].
-
-ALPHA(2*N+1) = 1.0_R8
-DO I=2*N,1,-1
-  J = I + 1
-  ALPHA(I) = -(DOT_PRODUCT(QR(I,J:2*N+1),ALPHA(J:2*N+1)) + QR(I,2*N+2)) &
-            /QR(I,I)
-END DO
-TZ(PIVOT) = ALPHA(1:2*N+1)
-
-! TZ now contains a particular solution P, and WP contains a vector Q
-! in the kernel (the unit tangent).
-SIGMA = DOT_PRODUCT(TZ,WP)
-TZ = TZ - SIGMA*WP
-
-! TZ is the Newton step from the current point W(S) = (LAMBDA(S), X(S)).
-RETURN
-END SUBROUTINE TANGENT_PLP
-
-                                                                     !!!
-SUBROUTINE ROOT_PLP
-! In a deleted neighborhood of a solution (1,X(SBAR)), the homotopy zero
-! curve (LAMBDA(S),X(S)) is assumed to safisfy X = X(LAMBDA), a consequence
-! of the Implicit Function Theorem and the fact that the Jacobian matrix
-! D RHO(A,LAMBDA(S),X(S))/DX is nonsingular in a sufficiently small
-! deleted neighborhood of an isolated solution.  Let
-!         TAU = 1 - LAMBDA = SIGMA**C,
-! where the positive integer C is the cycle number of the root.  Then
-!   X(LAMBDA) = X(1 - TAU) = X(1 - SIGMA**C) = Z(SIGMA)
-! is an analytic function of SIGMA in a neighborhood of SIGMA=0.  This fact
-! is exploited by guessing C and interpolating Z(SIGMA) within its
-! Maclaurin series' radius of convergence, but far enough away from 0 to
-! avoid numerical instability.  This annulus is called the "operating
-! range" of the algorithm.  The interpolant to analytic Z(SIGMA) is then
-! evaluated at SIGMA=0 to estimate the root X(1)=Z(0).
-
-! Local variables.
-IMPLICIT NONE
-INTEGER, PARAMETER:: CHAT_MAX=8, LITFH = 7
-INTEGER:: C, CHAT(1), CHAT_BEST, CHAT_OLD, GOING_BAD, I, & 
-  J, ML_ITER, N2P1, RETRY
-REAL (KIND=R8):: ACCURACY, FV(12), GM, H_SAVE, HC, HQ, HQ_BEST,    & 
-  HQMHC(CHAT_MAX), L(-3:2), S_SAVE, SIGMA(-3:2), SHRINK, T, TOL_1, &   
-  TOL_2, V(12) 
-LOGICAL:: EVEN, FIRST_JUMP, REUSE
-
-INTERFACE
-  FUNCTION DNRM2(N,X,STRIDE)
-    USE REAL_PRECISION
-    INTEGER:: N, STRIDE
-    REAL (KIND=R8):: DNRM2, X(N)
-  END FUNCTION DNRM2
-END INTERFACE
-
-N2P1 = 2*N + 1
-ACCURACY = MAX(FINALTOL,SQRT(EPSILON(1.0_R8))*10.0_R8**2)
-HQ_BEST = 10.0_R8*ACCURACY
-CHAT_BEST = 0 ; CHAT_OLD = 0 ; GOING_BAD = 0
-FIRST_JUMP = .TRUE. ; REUSE = .FALSE.
-YOLDS = 0.0_R8
-
-! Save the first point.
-H_SAVE = HOLD  
-S_SAVE = S - HOLD
-YS(:,1) = YOLD ; YS(:,2) = YPOLD
-
-! If Y(1) >= 1 or if YP(1) <= 0 back up to YOLD and generate another point.
-
-REFINE_Y: DO
-
-  IF ((Y(1) >= 1.0_R8) .OR. (YP(1) <= 0.0_R8)) THEN
-    SHRINK = 1.0_R8
-
-    ! Try 3 times to get a point.
-    DO I=1,3
-      SHRINK = SHRINK * .75_R8
-      S = S_SAVE
-      H = MIN(H_SAVE, SHRINK*(1.0_R8 - YS(1,1))/YS(1,2))
-
-      ! If Y(1)>=1 increase RELERR and ABSERR to prevent STEPNX from making
-      ! the stepsize too small.
-      IF (Y(1) >= 1.0_R8) THEN
-        RELERR = TRACKTOL ; ABSERR = TRACKTOL
-      END IF
-      Y = YS(:,1) ; YP = YS(:,2)
-      START = .TRUE.
-      CALL STEP_PLP
-      RELERR = FINALTOL ; ABSERR = FINALTOL
-      IF (IFLAG > 0) THEN
-        IFLAG = 4 ; RETURN
-      ELSE IF ((Y(1) < 1.0_R8) .AND. (YP(1) > 0.0_R8) .AND.  &
-	(Y(1) > YS(1,1))) THEN
-        ITER = ITER + 1
-        EXIT REFINE_Y
-      ELSE IF (I == 3) THEN 
-        IFLAG = 7 ; RETURN
-      END IF
-    END DO
-  ELSE
-
-    ! Refine the second point Y to FINALTOL accuracy.  If the refinement
-    ! fails, back up and get another point.
-    W = Y
-    RHOLEN = 0.0_R8
-    DO J=1,LITFH
-      CALL TANGENT_PLP(NEWTON_STEP=.TRUE.)
-      NNFE = NNFE + 1
-      IF (IFLAG > 0) THEN
-        IFLAG = -2
-        YP(1) = -1.0_R8 ; CYCLE REFINE_Y
-      END IF
-      W = W + TZ
-
-      ! Test for erratic LAMBDA.
-      IF (W(1) >= 1.0_R8 .OR. WP(1) <= 0.0_R8 .OR. W(1) <= YS(1,1)) THEN
-        YP(1) = -1.0_R8 ; CYCLE REFINE_Y 
-      END IF
-      IF (DNRM2(N2P1,TZ,1) <= FINALTOL * (DNRM2(N2P1,W,1) + 1.0_R8)) EXIT
-
-      ! Test for lack of convergence.
-      IF (J == LITFH) THEN
-        YP(1) = -1.0_R8 ; CYCLE REFINE_Y
-      END IF
-    END DO
-    Y = W ; YP = WP
-    S = S - HOLD
-    W = Y - YOLD
-    HOLD = DNRM2(N2P1,W,1)
-    S = S + HOLD
-    EXIT REFINE_Y
-  END IF
-
-END DO REFINE_Y
-
-! Save the second point.
-YS(:,3) = Y ; YS(:,4) = YP
-H_SAVE = H ; S_SAVE = S
-
-! Try entire end game interpolation process RETRY=10*NUMRR times.
-RETRY = 10*NUM_RERUNS
-
-MAIN_LOOP: &
-DO ML_ITER=1,RETRY
-
-  ! Get close enough to SIGMA=0 (LAMBDA=1) so that a Hermite cubic
-  ! interpolant is accurate to within TOL_1 (defined by CHAT).
-  OPERATING_RANGE: DO
-
-    ! Enforce LIMIT on the number of steps.
-    IF (ITER >= LIMIT) THEN
-      IFLAG = 3 ; EXIT MAIN_LOOP
-    END IF
-
-    SHRINK = 1.0_R8
-    DO J=1,3
-      SHRINK = .75_R8*SHRINK
-
-      ! Get a third point Y with Y(1) < 1.
-      H = MIN(H_SAVE, SHRINK*(1.0_R8 - Y(1))/YP(1))
-      CALL STEP_PLP
-      IF (IFLAG > 0) THEN
-        IFLAG = 4 ; EXIT MAIN_LOOP
-      ELSE IF ((Y(1) >= 1.0_R8) .OR. (YP(1) <= 0.0_R8) .OR.  &
-        (Y(1) <= YS(1,3))) THEN
-        ! Back up and try again with a smaller step.
-        Y = YS(:,3) ; YP = YS(:,4) ; YOLD = YS(:,1) ; YPOLD = YS(:,2)
-        S = S_SAVE
-      ELSE
-        ITER = ITER + 1
-        EXIT
-      END IF
-      IF (J == 3) THEN 
-        IFLAG = 7 ; EXIT MAIN_LOOP
-      END IF
-    END DO
-
-    ! Save the third point.
-    YS(:,5) = Y ; YS(:,6) = YP
-    H_SAVE = H ; S_SAVE = S
-
-    ! L(2) < L(1) < L(0) < 1.
-
-    L(2) = YS(1,1) ; L(1) = YS(1,3) ; L(0) = YS(1,5)
-
-    ! Test approximation quality for each cycle number C = 1,...,CHAT_MAX.
-
-    SHRINK = 1.0_R8/(1.0_R8 + MAXVAL(ABS(YS(2:N2P1,5))))
-    DO C=1,CHAT_MAX
-      SIGMA(0:2) = (1.0_R8 - L(0:2))**(1.0_R8/REAL(C,KIND=R8))
-
-      ! 0 < SIGMA(0) < SIGMA(1) < SIGMA(2).
-      ! Compute difference between Hermite quintic HQ(SIGMA) interpolating at
-      ! SIGMA(0:2) and Hermite cubic HC(SIGMA) interpolating at SIGMA(0:1).
-      ! The interpolation points for the Newton form are (SIGMA(0), SIGMA(0),
-      ! SIGMA(1), SIGMA(1), SIGMA(2), SIGMA(2)).  The function values are in
-      ! YS(:,5:1:-2) and the derivatives YS(:,6:2:-2) = dX/dS have to be
-      ! converted to dX/dSIGMA.
-
-      T = 0.0_R8
-      V(1:6) = (/ (SIGMA(J),SIGMA(J),J=0,2) /)
-      DO J=2,N2P1
-        FV(1:5:2) = YS(J,5:1:-2)
-        FV(2:6:2) = (YS(J,6:2:-2)/YS(1,6:2:-2)) * (-REAL(C,KIND=R8)) * &
-          SIGMA(0:2)**(C-1)
-        CALL INTERP(V(1:6),FV(1:6))
-        T = MAX(T,ABS(FV(5) - SIGMA(2)*FV(6)))
-      END DO
-
-      ! T*(SIGMA(1)*SIGMA(0))**2 = ||HQ(0) - HC(0)||_infty.
-
-      HQMHC(C) = T*((SIGMA(1)*SIGMA(0))**2)*SHRINK
-    END DO
-
-    ! Find best estimate CHAT of cycle number.
-    CHAT = MINLOC(HQMHC)
-
-    ! If there has been one successful jump across the origin (with
-    ! CHAT_BEST) and the cycle number prediction changes, then the process
-    ! may be leaving the operating range.
-
-    IF (( .NOT. FIRST_JUMP) .AND. (CHAT(1) /= CHAT_BEST)) THEN
-      GOING_BAD = GOING_BAD + 1
-      IF (GOING_BAD == 2) EXIT MAIN_LOOP
-    END IF
-    TOL_1 = ACCURACY*10.0_R8**(REAL(CHAT(1),KIND=R8)/2.0_R8)
-    IF (HQMHC(CHAT(1)) <= TOL_1) THEN
-      EXIT OPERATING_RANGE
-    ELSE IF ( .NOT. FIRST_JUMP) THEN
-      GOING_BAD = GOING_BAD + 1
-      IF (GOING_BAD == 2) EXIT MAIN_LOOP
-    END IF
-
-    ! Shift point history, and try to get closer to SIGMA=0.
-    YS(:,1:2) = YS(:,3:4) ; YS(:,3:4) = YS(:,5:6) ; REUSE = .FALSE.
-  END DO OPERATING_RANGE
-
-  ! Add 3 new points past SIGMA=0 such that
-  ! SIGMA(2) > SIGMA(1) > SIGMA(0) > 0 > SIGMA(-1) > SIGMA(-2) > SIGMA(-3).
-  ! If CHAT is odd then the corresponding LAMBDA are such that
-  !   L(2)   <   L(1)   <   L(0)   < 1 <   L(-1)   <   L(-2)   <   L(-3),
-  ! and if CHAT is even then
-  !   L(2)   <   L(1)   <   L(0)   < 1
-  !                                  1 >   L(-1)   >   L(-2)   >   L(-3).
-
-  SIGMA(0:2) = (1.0_R8 - L(0:2))**(1.0_R8/REAL(CHAT(1),KIND=R8))
-  DO I=1,3
-    V(1:4+2*I) = (/ (SIGMA(J),SIGMA(J),J=2,1-I,-1) /)
-    DO J=2,N2P1
-      FV(1:3+2*I:2) = YS(J,1:3+2*I:2)
-      FV(2:4+2*I:2) = (YS(J,2:4+2*I:2)/YS(1,2:4+2*I:2)) * &
-        (-REAL(CHAT(1),KIND=R8)) * SIGMA(2:1-I:-1)**(CHAT(1)-1)
-      CALL INTERP(V(1:4+2*I),FV(1:4+2*I))
-      CALL INTERP(V(1:4+2*I),FV(1:4+2*I),-SIGMA(I-1),W(J))
-    END DO
-    IF (MOD(CHAT(1),2) == 0) THEN
-      EVEN = .TRUE.
-      W(1) = L(I-1)
-    ELSE
-      EVEN = .FALSE.
-      W(1) = 2.0_R8 - L(I-1)
-    END IF
-
-    ! W now contains the (predicted) point symmetric to SIGMA(I-1) with
-    ! respect to SIGMA=0.
-    RHOLEN = 0.0_R8
-
-    ! Correct the prediction.  If there has been one successful jump across
-    ! the origin, correction failures may indicate that the process is
-    ! leaving the operating range.
-    DO J=1,LITFH
-      CALL TANGENT_PLP(NEWTON_STEP=.TRUE.)
-      NNFE = NNFE + 1
-
-      ! Test for singular Jacobian matrix.
-      IF (IFLAG > 0) EXIT MAIN_LOOP
-      W = W + TZ
-
-      ! Test for erratic LAMBDA.
-      IF ((( .NOT. EVEN) .AND. (W(1) <= 1.0_R8)) .OR.  &
-          (EVEN .AND. (W(1) >= 1.0_R8))) THEN
-        IF ( .NOT. FIRST_JUMP) THEN
-          GOING_BAD = GOING_BAD + 1
-          IF (GOING_BAD == 2) EXIT MAIN_LOOP
-        END IF  
-        YS(:,1:2) = YS (:,3:4) ; YS(:,3:4) = YS(:,5:6) 
-        REUSE = .FALSE. ; CYCLE MAIN_LOOP
-      END IF
-      IF (DNRM2(N2P1,TZ,1) <= FINALTOL * (DNRM2(N2P1,W,1) + 1.0_R8)) EXIT
-
-      ! Test for lack of convergence.
-      IF (J == LITFH) THEN
-        IF ( .NOT. FIRST_JUMP) THEN
-          GOING_BAD = GOING_BAD + 1
-          IF (GOING_BAD == 2) EXIT MAIN_LOOP
-        END IF
-        YS(:,1:2) = YS (:,3:4) ; YS(:,3:4) = YS(:,5:6)
-        REUSE = .FALSE. ; CYCLE MAIN_LOOP
-      END IF
-    END DO
-
-    ! Ensure that the tangent vector has the correct direction.
-    IF (EVEN) THEN
-      IF (WP(1) > 0.0_R8) WP = -WP
-    ELSE
-      IF (WP(1) < 0.0_R8) WP = -WP
-    END IF
-
-    ! Update the lambda (L), sigma (SIGMA), and history (YS) arrays.
-    L(-I) = W(1)
-    SIGMA(-I) =  -(ABS(L(-I) - 1.0_R8))**(1.0_R8/REAL(CHAT(1),KIND=R8))
-    YS(:,5+2*I) = W ; YS(:,6+2*I) = WP
-
-    ! Reuse old points if the cycle number estimation has not changed
-    ! from the last iteration, and the origin was successfully jumped in
-    ! the last iteration.
-    IF (REUSE .AND. (CHAT(1) == CHAT_OLD)) EXIT
-  END DO
-
-  ! Construct 12th order interpolant and estimate the root at SIGMA=0. 
-  HC = 0.0_R8 ; HQ = 0.0_R8 ; T = 0.0_R8
-  V(1:12) = (/ (SIGMA(J),SIGMA(J),J=-3,2) /)
-  DO J=2,N2P1
-    FV(1:11:2) = YS(J,11:1:-2)
-    FV(2:12:2) = (YS(J,12:2:-2)/YS(1,12:2:-2)) * &
-      (-REAL(CHAT(1),KIND=R8)) * SIGMA(-3:2)**(CHAT(1)-1)
-    CALL INTERP(V(1:12),FV(1:12))
-    CALL INTERP(V(1:12),FV(1:12),0.0_R8,W(J))
-
-    ! Difference between 8th and 6th order Hermite interpolants.
-    T  = MAX(T ,ABS(FV( 7) - SIGMA(0)*FV( 8)))
-
-    ! Difference between 10th and 8th order Hermite interpolants.
-    HC = MAX(HC,ABS(FV( 9) - SIGMA(1)*FV(10)))
-
-    ! Difference between 12th and 10th order Hermite interpolants.
-    HQ = MAX(HQ,ABS(FV(11) - SIGMA(2)*FV(12)))
-  END DO
-  SHRINK = 1.0_R8/(1.0_R8 + MAXVAL(ABS(W(2:N2P1))))
-  T  =  T*((PRODUCT(SIGMA(-3:-1)))**2)*SHRINK  ! ||H_7  - H_5||/(1+||W||)
-  HC = HC*((PRODUCT(SIGMA(-3: 0)))**2)*SHRINK  ! ||H_9  - H_7||/(1+||W||)
-  HQ = HQ*((PRODUCT(SIGMA(-3: 1)))**2)*SHRINK  ! ||H_11 - H_9||/(1+||W||)
-
-  ! Check both accuracy and consistency of Hermite interpolants.
-  TOL_2 = FINALTOL * (10**(CHAT(1) - 1))
-  GM = SQRT(TOL_1 * TOL_2)
-  IF ((T <= TOL_1) .AND. (HC <= GM) .AND. (HQ <= TOL_2)) THEN
-
-    ! Full convergence.
-    IF (FIRST_JUMP) FIRST_JUMP = .FALSE.
-    YOLDS(2:N2P1) = W(2:N2P1) ; HQ_BEST = HQ
-    CHAT_BEST = CHAT(1)
-    EXIT MAIN_LOOP
-  ELSE IF (HQ > 1.01_R8*HQ_BEST) THEN
-    IF ( .NOT. FIRST_JUMP) THEN
-      GOING_BAD = GOING_BAD + 1
-      IF (GOING_BAD == 2) EXIT MAIN_LOOP
-    END IF
-  ELSE
-
-    ! Progress has been made.
-    IF (FIRST_JUMP) FIRST_JUMP = .FALSE.
-    GOING_BAD = 0
-    YOLDS(2:N2P1) = W(2:N2P1) ; HQ_BEST = HQ
-    CHAT_BEST = CHAT(1)
-  END IF
-
-  ! Shift point history.
-  YS(:,1:2) = YS(:,3:4) ; YS(:,3:4) = YS(:,5:6)
-
-  ! If the cycle number estimate does not change in the next iteration, the
-  ! points found across the origin can be reused.
-  REUSE = .TRUE. ; CHAT_OLD = CHAT(1)
-  SIGMA(-3)   = SIGMA(-2)  ; SIGMA(-2)  = SIGMA(-1)
-  YS(:,11:12) = YS(:,9:10) ; YS(:,9:10) = YS(:,7:8)
-
-END DO MAIN_LOOP
-
-IF (ML_ITER >= RETRY) IFLAG = 7
-
-! Return final solution in Y.
-IF ( .NOT. FIRST_JUMP) THEN
-  Y(1) = HQ_BEST ; Y(2:N2P1) = YOLDS(2:N2P1)
-  IFLAG = 1 + 10*CHAT_BEST
-END IF
-RETURN
-END SUBROUTINE ROOT_PLP
-
-                                                                     !!!
-SUBROUTINE INTERP(T,FT,X,FX)
-! Given data points T(:) and function values FT(:)=f(T(:)), INTERP
-! computes the Newton form of the interpolating polynomial to f at T(:).
-! T is assumed to be sorted, and if
-! T(I-1) < T(I) = T(I+1) = ... = T(I+K) < T(I+K+1) then
-! FT(I)=f(T(I)), FT(I+1)=f'(T(I)), ..., FT(I+K)=f^{(K)}(T(I)).
-! On return FT(K) contains the divided difference f[T(1),...,T(K)], and
-! FX contains the interpolating polynomial evaluated at X.  If X and FX
-! are present, the divided differences are not calculated.
-
-IMPLICIT NONE
-REAL (KIND=R8), DIMENSION(:):: T, FT
-REAL (KIND=R8), OPTIONAL:: X, FX
-
-! Local variables.
-REAL (KIND=R8):: FOLD,SAVE
-INTEGER:: I,K,N
-
-N = SIZE(T)
-IF (.NOT. PRESENT(X)) THEN ! Calculate divided differences.
-  DO K=1,N-1
-    FOLD = FT(K)
-    DO I=K+1,N
-      IF (T(I) == T(I-K)) THEN
-        FT(I) = FT(I)/REAL(K,KIND=R8)
-      ELSE
-        SAVE = FT(I)
-        FT(I) = (FT(I) - FOLD)/(T(I) - T(I-K))
-        FOLD = SAVE
-      END IF
-    END DO
-  END DO
-  RETURN
-END IF
-FX = FT(N) ! Evaluate Newton polynomial.
-DO K=N-1,1,-1
-  FX = FX*(X - T(K)) + FT(K)
-END DO
-RETURN
-END SUBROUTINE INTERP
-
-                                                                     !!!
-SUBROUTINE RHO(LAMBDA,X)
-! RHO evaluates the (complex) homotopy map
-!
-!   RHO(A,LAMBDA,X) = LAMBDA*F(X) + (1 - LAMBDA)*GAMMA*G(X),
-!
-! where GAMMA is a random complex constant, and the Jacobian
-! matrix [ D RHO(A,LAMBDA,X)/D LAMBDA, D RHO(A,LAMBDA,X)/DX ] at
-! (A,LAMBDA,X), and updates the global arrays RHOV (the homotopy map),
-! DRHOX (the derivative of the homotopy with repect to X) , and DRHOL
-! (the derivative with respect to LAMBDA).  The vector A corresponds
-! mathematically to all the random coefficients in the start system, and
-! is not explicitly referenced by RHO.  X, on entry, is real, but since
-! arithmetic in RHO is complex, X is converted to complex form.  Before
-! return RHO converts the homotopy map and the two derivatives back to
-! real.  Precisely, suppose XC is the complexification of X, i.e.,
-!
-! XC(1:N)=CMPLX(X(1:2*N-1:2),X(2:2*N:2)).
-!
-! Let CRHOV(A,LAMBDA,XC) be the (complex) homotopy map.  Then RHOV
-! is just
-!
-! RHOV(1:2*N-1:2) = REAL( CRHOV(1:N)),
-! RHOV(2:2*N  :2) = AIMAG(CRHOV(1:N)).
-!
-! Let CDRHOXC = D CRHOV(A,LAMBDA,XC)/D XC denote the (complex) derivative
-! of the homotopy map with respect to XC, evaluated at (A,LAMBDA,XC).
-! DRHOX is obtained by
-!
-! DRHOX(2*I-1,2*J-1) = REAL(CDRHOXC(I,J)),
-! DRHOX(2*I  ,2*J  ) = DRHOX(2*I-1,2*J-1),
-! DRHOX(2*I  ,2*J-1) = AIMAG(CDRHOXC(I,J)),
-! DRHOX(2*I-1,2*J  ) = -DRHOX(2*I  ,2*J-1),
-!
-! for I, J = 1,...,N.  Let CDRHOL = D CRHOV(A,LAMBDA,XC)/D LAMBDA denote
-! the (complex) derivative of the homotopy map with respect to LAMBDA,
-! evaluated at (A,LAMBDA,XC).  Then DRHOL is obtained by
-!
-! DRHOL(1:2*N-1:2) = REAL( CDRHOL(1:N)),
-! DRHOL(2:2*N  :2) = AIMAG(CDRHOL(1:N)).
-!
-! (None of CRHOV, CDRHOXC, or CDRHOL are in the code.)
-!
-! Internal subroutines:  START_SYSTEM, TARGET_SYSTEM.
-! External (optional, user written) subroutine:  TARGET_SYSTEM_USER.
-!
-! On input:
-!
-! LAMBDA is the continuation parameter.
-!
-! X(1:2*N) is the real 2*N-dimensional evaluation point.
-!
-! On exit:
-!
-! LAMBDA and X are unchanged.
-!
-! RHOV(1:2*N) is the real (2*N)-dimensional representation of the
-!   homotopy map RHO(A,LAMBDA,X).
-!
-! DRHOX(1:2*N,1:2*N) is the real (2*N)-by-(2*N)-dimensional
-!   representation of D RHO(A,LAMBDA,X)/DX evaluated at (A,LAMBDA,X).
-!
-! DRHOL(1:2*N) is the real (2*N)-dimensional representation of
-!   D RHO(A,LAMBDA,X)/D LAMBDA evaluated at (A,LAMBDA,X).
-
-IMPLICIT NONE
-REAL (KIND=R8), INTENT(IN):: LAMBDA
-REAL (KIND=R8), DIMENSION(2*N), INTENT(IN):: X
-
-INTERFACE
-SUBROUTINE TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF)
-  USE REAL_PRECISION
-  INTEGER, INTENT(IN):: N
-  COMPLEX (KIND=R8), INTENT(IN), DIMENSION(N+1):: PROJ_COEF,XC
-  COMPLEX (KIND=R8), INTENT(OUT):: F(N), DF(N,N+1)
-END SUBROUTINE TARGET_SYSTEM_USER
-END INTERFACE
-
-! Local variables.
-INTEGER:: I, J
-REAL (KIND=R8):: ONEML
-COMPLEX (KIND=R8):: GAMMA
-
-ONEML = 1.0_R8 - LAMBDA
-GAMMA = (.0053292102547824_R8,.9793238462643383_R8)
-
-! Convert the real-valued evaluation point X to a complex vector.
-XC(1:N) = CMPLX(X(1:2*N-1:2),X(2:2*N:2),KIND=R8)
-
-! Calculate the homogeneous variable.
-XC(N+1) = SUM(PROJ_COEF(1:N)*XC(1:N)) + PROJ_COEF(N+1)
-
-CALL START_SYSTEM              ! Returns G and DG.
-IF (PRESENT(USER_F_DF)) THEN   ! Returns F and DF.
-  CALL TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF) ! User written subroutine.
-ELSE
-  CALL TARGET_SYSTEM ! Internal subroutine.
-END IF
-
-! Convert complex derivatives to real derivatives via the Cauchy-Riemann
-! equations.
-DO I=1,N
-  DO J=1,N  
-    DRHOX(2*I-1,2*J-1) = LAMBDA*REAL(DF(I,J)) + ONEML*REAL(DG(I,J)*GAMMA)
-    DRHOX(2*I  ,2*J  ) = DRHOX(2*I-1,2*J-1)
-    DRHOX(2*I  ,2*J-1) = LAMBDA*AIMAG(DF(I,J)) + ONEML*AIMAG(DG(I,J)*GAMMA)
-    DRHOX(2*I-1,2*J  ) = -DRHOX(2*I,2*J-1)
-  END DO
-END DO
-  DRHOL(1:2*N-1:2) = REAL(F) - REAL(G*GAMMA)
-  DRHOL(2:2*N:2  ) = AIMAG(F) - AIMAG(G*GAMMA) 
-  RHOV(1:2*N-1:2)  = LAMBDA*REAL(F) + ONEML*REAL(G*GAMMA)
-  RHOV(2:2*N:2  )  = LAMBDA*AIMAG(F) + ONEML*AIMAG(G*GAMMA)
-RETURN
-END SUBROUTINE RHO
-
-                                                                     !!!
-SUBROUTINE START_SYSTEM
-! START_SYSTEM evaluates the start system G(XC) and the Jacobian matrix
-!   DG(XC).  Arithmetic is complex.
-!
-! On exit:
-!
-! G(:) contains the complex N-dimensional start system evaluated at XC(:).
-!
-! DG(:,:) contains the complex N-by-N-dimensional Jacobian matrix of
-!   the start system evaluted at XC(:). 
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: I, J, K, L
-COMPLEX (KIND=R8):: TEMP
-
-! TEMP1G AND TEMP2G are employed to reduce recalculation in G and DG.
-! Note:  If SD(I,J)=0, then the corresponding factor is 1, not 0.
-TEMP1G = (0.0_R8,0.0_R8)
-TEMP2G = (0.0_R8,0.0_R8)
-DO I=1,N
-  DO J=1,PARTITION_SIZES(I)
-    IF (PARTITION(I)%SET(J)%SET_DEG == 0) THEN
-      TEMP2G(I,J) = (1.0_R8,0.0_R8)
-    ELSE
-      K = PARTITION(I)%SET(J)%NUM_INDICES
-      TEMP1G(I,J) = SUM( PARTITION(I)%SET(J)%START_COEF(1:K)*  &
-                         XC(PARTITION(I)%SET(J)%INDEX(1:K)) )
-      TEMP2G(I,J) = TEMP1G(I,J)**PARTITION(I)%SET(J)%SET_DEG - &
-                        XC(N+1)**PARTITION(I)%SET(J)%SET_DEG
-    END IF
-  END DO
-  G(I) = PRODUCT(TEMP2G(I,1:PARTITION_SIZES(I)))
-END DO
-
-! Calculate the derivative of G with respect to XC(1),...,XC(N)
-!   in 3 steps.
-! STEP 1:  First treat XC(N+1) as an independent variable. 
-
-DG = (0.0_R8,0.0_R8)  
-DO I=1,N
-  DO J=1,PARTITION_SIZES(I)
-    IF (PARTITION(I)%SET(J)%SET_DEG == 0) CYCLE
-    K = PARTITION(I)%SET(J)%NUM_INDICES
-    DG(I,PARTITION(I)%SET(J)%INDEX(1:K)) = PARTITION(I)%SET(J)%SET_DEG * &
-      PARTITION(I)%SET(J)%START_COEF(1:K) * &
-      (TEMP1G(I,J)**(PARTITION(I)%SET(J)%SET_DEG - 1))
-    TEMP = (1.0_R8,0.0_R8)
-    DO L=1,PARTITION_SIZES(I)
-      IF (L == J) CYCLE
-      TEMP = TEMP * TEMP2G(I,L)
-    END DO
-    DG(I,PARTITION(I)%SET(J)%INDEX(1:K)) = &
-      DG(I,PARTITION(I)%SET(J)%INDEX(1:K)) * TEMP
-  END DO
-END DO
-
-! STEP 2:  Now calculate the N-by-1 Jacobian matrix of G with
-!   respect to XC(N+1) using the product rule.
-
-DO I=1,N
-  DO J=1,PARTITION_SIZES(I)
-    IF (PARTITION(I)%SET(J)%SET_DEG == 0) CYCLE            
-    TEMP = -PARTITION(I)%SET(J)%SET_DEG * &
-      (XC(N+1)**(PARTITION(I)%SET(J)%SET_DEG - 1))
-    DO K=1,PARTITION_SIZES(I)
-      IF (K == J) CYCLE
-      TEMP = TEMP*TEMP2G(I,K)
-    END DO
-    DG(I,N+1) = DG(I,N+1) + TEMP
-  END DO
-END DO
-
-! STEP 3:  Use the chain rule with XC(N+1) considered as a function
-!   of XC(1),...,XC(N).
-
-DO I=1,N
-  DG(I,1:N) = DG(I,1:N) + DG(I,N+1) * PROJ_COEF(1:N)
-END DO
-RETURN
-END SUBROUTINE START_SYSTEM
-
-                                                                     !!!
-SUBROUTINE TARGET_SYSTEM
-! TARGET_SYSTEM calculates the target system F(XC) and the Jacobian matrix
-!   DF(XC).  Arithmetic is complex.
-!
-! On exit:
-!
-! F(:) contains the complex N-dimensional target system evaluated
-!   at XC(:).
-!
-! DF(:,:) is the complex N-by-N-dimensional Jacobian matrix of the
-!   target system evaluated at XC(:).
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: I, J, K, L
-COMPLEX (KIND=R8):: T, TS
-
-! Evaluate F(XC).  For efficiency, indexing functions and array sections
-! are avoided.
-DO I=1,N
-  TS = (0.0_R8, 0.0_R8)
-  DO J=1,POLYNOMIAL(I)%NUM_TERMS
-    T = POLYNOMIAL(I)%TERM(J)%COEF
-    DO K=1,N+1
-      IF (POLYNOMIAL(I)%TERM(J)%DEG(K) == 0) CYCLE
-      T = T * XC(K)**POLYNOMIAL(I)%TERM(J)%DEG(K)
-    END DO
-    TS = TS + T
-  END DO
-  F(I) = TS
-END DO 
-
-! Calulate the Jacobian matrix DF(XC).
-DF = (0.0_R8,0.0_R8)
-DO I=1,N
-  DO J=1,N+1
-    TS = (0.0_R8,0.0_R8)
-    DO K=1,POLYNOMIAL(I)%NUM_TERMS
-      IF (POLYNOMIAL(I)%TERM(K)%DEG(J) == 0) CYCLE
-      T = POLYNOMIAL(I)%TERM(K)%COEF * POLYNOMIAL(I)%TERM(K)%DEG(J) * &
-          (XC(J)**(POLYNOMIAL(I)%TERM(K)%DEG(J) - 1))
-      DO L=1,N+1
-        IF ((L == J) .OR. (POLYNOMIAL(I)%TERM(K)%DEG(L) == 0)) CYCLE
-        T = T * (XC(L)**POLYNOMIAL(I)%TERM(K)%DEG(L))
-      END DO
-      TS = TS + T
-    END DO
-    DF(I,J) = TS
-  END DO
-END DO
-
-! Convert DF to partials with respect to XC(1),...,XC(N) by
-!   applying the chain rule with XC(N+1) considered as a function
-!   of XC(1),...,XC(N).
-DO I=1,N
-  DF(I,1:N) = DF(I,1:N) + PROJ_COEF(1:N) * DF(I,N+1)
-END DO
-RETURN
-END SUBROUTINE TARGET_SYSTEM
-
-                                                                     !!!
-SUBROUTINE OUTPUT_PLP
-! OUTPUT_PLP first untransforms (converts from projective to affine
-! coordinates) and then unscales a root.
-!
-! On entry:
-!
-! XC(1:N) contains a root in projective coordinates, with the (N+1)st
-!   projective coordinate XC(N+1) implicitly defined by the
-!   projective transformation.
-!
-! On exit:
-!
-! XC(1:N) contains the untransformed (affine), unscaled root.
-!
-! XC(N+1) is the homogeneous coordinate of the root of the scaled
-!   target system, if scaling was performed. 
-
-IMPLICIT NONE
-INTEGER:: I
-REAL (KIND=R8), PARAMETER:: BIG=HUGE(1.0_R8)
-
-! Calculate the homogeneous coordinate XC(N+1) using the vector XC(1:N)
-! with the projective transformation, then untransform XC(1:N) (convert
-! to affine coordinates).
-XC(N+1) = SUM(PROJ_COEF(1:N)*XC(1:N)) + PROJ_COEF(N+1)
-
-! Deal carefully with solutions at infinity.
-IF (ABS(XC(N+1)) < 1.0_R8) THEN
-  DO I=1,N
-    IF (ABS(XC(I)) >= BIG*ABS(XC(N+1))) THEN
-      XC(I) = CMPLX(BIG,BIG,KIND=R8)  ! Solution at infinity.
-    ELSE
-      XC(I) = XC(I)/XC(N+1)
-    END IF
-  END DO
-ELSE
-  XC(1:N) = XC(1:N)/XC(N+1)
-END IF
-
-! Unscale the variables.
-IF (.NOT. PRESENT(NO_SCALING)) THEN
-  DO I=1,N
-    IF (REAL(XC(I)) /= BIG) XC(I) = XC(I)*(10.0_R8**SCALE_FACTORS(I))
-  END DO
-END IF
-
-RETURN
-END SUBROUTINE OUTPUT_PLP
-END SUBROUTINE POLSYS_PLP
-
-                                                                     !!!
-SUBROUTINE BEZOUT_PLP(N,MAXT,TOL,BPLP)
-!
-! BEZOUT_PLP calculates and returns only the generalized Bezout number
-! BPLP of the target polynomial system, based on the variable partition
-! P defined in the module GLOBAL_PLP.  BEZOUT_PLP finds BPLP very
-! quickly, which is useful for exploring alternative partitions.
-!
-! Calls SINGSYS_PLP.
-! 
-! On input:
-!
-! N is the dimension of the target system.
-!
-! MAXT is the maximum number of terms in any component of the target
-!   system.  MAXT = MAX((/(NUMT(I),I=1,N)/)).
-!
-! TOL is the singularity test threshold used by SINGSYS_PLP.  If
-!   TOL <= 0.0 on input, TOL is reset to the default value
-!   SQRT(EPSILON(1.0_R8)).
-!
-! GLOBAL_PLP allocatable objects POLYNOMIAL, PARTITION_SIZES, and
-!   PARTITION (see GLOBAL_PLP documentation) must be allocated and
-!   defined in the calling program.
-!
-! On output:
-!
-! N and MAXT are unchanged, and TOL may have been changed as described
-!   above.
-!
-! BPLP is the generalized Bezout number for the target system based on
-!   the variable partition P defined in the module GLOBAL_PLP.
-
-USE GLOBAL_PLP
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N, MAXT
-REAL (KIND=R8), INTENT(IN OUT):: TOL
-INTEGER, INTENT(OUT):: BPLP
-
-!INTERFACE
-!  SUBROUTINE SINGSYS_PLP(N,LEX_NUM,LEX_SAVE,TOL,RAND_MAT,MAT,NONSING)
-!  USE GLOBAL_PLP
-!  INTEGER, INTENT(IN):: N
-!  INTEGER, DIMENSION(N), INTENT(IN OUT):: LEX_NUM,LEX_SAVE
-!  REAL (KIND=R8), INTENT(IN):: TOL
-!  REAL (KIND=R8), DIMENSION(N,N), INTENT(IN):: RAND_MAT
-!  REAL (KIND=R8), DIMENSION(N+1,N), INTENT(IN OUT):: MAT
-!  LOGICAL, INTENT(OUT):: NONSING
-!  END SUBROUTINE SINGSYS_PLP
-!END INTERFACE
-
-! Local variables.
-INTEGER:: I, J, K, L
-INTEGER, DIMENSION(MAXT):: DHOLD
-INTEGER, DIMENSION(N):: LEX_NUM, LEX_SAVE
-REAL (KIND=R8), DIMENSION(N+1,N):: MAT
-REAL (KIND=R8), DIMENSION(N,N):: RAND_MAT
-REAL, DIMENSION(N,N):: RANDNUMS
-LOGICAL:: NONSING
-
-! Set default value for singularity threshold TOL.
-IF (TOL <= REAL(N,KIND=R8)*EPSILON(1.0_R8)) TOL = SQRT(EPSILON(1.0_R8))
-
-! Initialize RAND_MAT with random numbers uniformly distributed in
-! [-1,-1/2] union [1/2,1].
-CALL RANDOM_SEED
-CALL RANDOM_NUMBER(HARVEST=RANDNUMS)
-RANDNUMS = RANDNUMS - 0.5 + SIGN(0.5, RANDNUMS - 0.5)
-RAND_MAT = REAL(RANDNUMS,KIND=R8)
-
-! Calculate set degrees of the variable partition P.
-DHOLD = 0
-DO I=1,N
-  DO J=1,PARTITION_SIZES(I)
-    DO K=1,NUMV(I,J)
-      DHOLD(1:NUMT(I)) = (/(D(I,L,PAR(I,J,K)),L=1,NUMT(I))/)+DHOLD(1:NUMT(I))
-    END DO
-    PARTITION(I)%SET(J)%SET_DEG = MAXVAL(DHOLD(1:NUMT(I)))
-    DHOLD = 0
-  END DO
-END DO
-
-! Compute Bezout number using lexicographic ordering.
-
-BPLP = 0
-LEX_NUM(1:N-1) = 1
-LEX_NUM(N) = 0
-LEX_SAVE = 0
-
-MAIN_LOOP: DO 
-  DO J=N,1,-1
-    IF (LEX_NUM(J) < PARTITION_SIZES(J)) THEN
-      L = J
-      EXIT
-    END IF
-  END DO
-  LEX_NUM(L) = LEX_NUM(L) + 1
-  IF (L + 1 <= N) LEX_NUM(L+1:N) = 1
-
-  ! Test singularity of start subsystem corresponding to lexicographic
-  ! vector LEX_NUM.
-  CALL SINGSYS_PLP(N,LEX_NUM,LEX_SAVE,TOL,RAND_MAT,MAT,NONSING)
-  IF (NONSING) BPLP = BPLP + PRODUCT((/(SD(K,LEX_NUM(K)),K=1,N)/))
-  IF (ALL(LEX_NUM == PARTITION_SIZES)) EXIT
-END DO MAIN_LOOP
-
-RETURN
-END SUBROUTINE BEZOUT_PLP
-
-                                                                     !!!
-SUBROUTINE SINGSYS_PLP(N,LEX_NUM,LEX_SAVE,TOL,RAND_MAT,MAT,NONSING)
-!
-! SINGSYS_PLP determines if the subsystem of the start system
-! corresponding to the lexicographic vector LEX_NUM is nonsingular,
-! or if a family of subsystems of the start system defined by
-! LEX_NUM and LEX_SAVE is singular, by using Householder reflections and
-! tree pruning.  Using the notation defined in the module GLOBAL_PLP,
-! the vector LEX_NUM defines a linear system of equations
-!     L(1,LEX_NUM(1)) = constant_1
-!                     .
-!                     .
-!                     .
-!     L(N,LEX_NUM(N)) = constant_N
-! which, if nonsingular for generic coefficients, defines
-! PRODUCT((/ (SD(K,LEX_NUM(K)), K=1,N) /)) nonsingular starting points
-! for homotopy paths.  Nonsingularity of a generic coefficient matrix is
-! checked by computing a QR decomposition of the transpose of the
-! coefficient matrix.  Observe that if the first J rows are rank
-! deficient, then all lexicographic vectors (LEX_NUM(1:J), *) also
-! correspond to singular systems, and thus the tree of all possible
-! lexicographic orderings can be pruned.
-!
-! The QR factorization is maintained as a product of Householder
-! reflections, and updated based on the difference between LEX_SAVE
-! (the value of LEX_NUM returned from the previous call to SINGSYS_PLP)
-! and the current input LEX_NUM.  LEX_SAVE and LEX_NUM together
-! implicitly define a family of subsystems, namely, all those
-! corresponding to lexicographic orderings with head LEX_NUM(1:J),
-! where J is the smallest index such that LEX_SAVE(J) /= LEX_NUM(J).
-!
-! Calls LAPACK subroutines DLARFX and DLARFG.
-!
-! On input:
-!
-! N is the dimension of the start and target systems.
-!
-! LEX_NUM(1:N) is a lexicographic vector which specifies a particular
-!   subsystem (and with LEX_SAVE a family of subsystems) of the start
-!   system.
-!
-! LEX_SAVE(1:N) holds the value of LEX_NUM returned from the previous
-!   call, and should not be changed between calls to SINGSYS_PLP.  Set
-!   LEX_SAVE=0 on the first call to SINGSYS_PLP.
-!
-! TOL is the singularity test threshold.  The family of subsystems
-!   corresponding to lexicographic vectors (LEX_NUM(1:J), *) is declared
-!   singular if ABS(R(J,J)) < TOL for the QR factorization of a generic
-!   start system coefficient matrix.
-!
-! RAND_MAT(N,N) is a random matrix with entries uniformly distributed
-!   in [-1,-1/2] union [1/2,1], used to seed the random generic
-!   coefficient matrix MAT.  RAND_MAT should not change between calls to
-!   SINGSYS_PLP.
-!
-! On output:
-!
-! LEX_NUM is unchanged if NONSING=.TRUE.  If NONSING=.FALSE.,
-!   LEX_NUM(1:J) is unchanged, and
-!   LEX_NUM(J+1:N) = PARTITION_SIZES(J+1:N), where J is the smallest
-!   index such that ABS(R(J,J)) < TOL for the QR factorization of the
-!   generic start system coefficient matrix corresponding to LEX_NUM
-!   (on input).
-!
-! LEX_SAVE = LEX_NUM.
-!
-! NONSING = .TRUE. if the subsystem of the start system defined by
-!   LEX_NUM is nonsingular.  NONSING = .FALSE. otherwise, which means that
-!   the entire family of subsystems corresponding to lexicographic vectors
-!   (LEX_NUM(1:J), *) is singular, where J is the smallest index such that
-!   ABS(R(J,J)) < TOL for the QR factorization of the generic start system
-!   coefficient matrix corresponding to LEX_NUM (on input).
-!
-! Working storage:
-!
-! MAT(N+1,N) is updated on successive calls to SINGSYS_PLP, and should
-! not be changed by the calling program.  MAT can be undefined on the
-! first call to SINGSYS_PLP (when LEX_SAVE = 0).  Define J as the
-! smallest index where LEX_SAVE(J) /= LEX_NUM(J).  Upon exit after a
-! subsequent call, for some M >= J, MAT contains, in the first M columns,
-! a partial QR factorization stored as a product of Householder
-! reflections, and, in the last N-M columns, random numbers that define
-! the subsystem of the start system corresponding to the lexicographic
-! vector LEX_NUM.  For 1<=K<=M, V(2:N+1-K)=MAT(K+1:N,K), V(1)=1, together
-! with TAU=MAT(N+1,K), define a Householder reflection of dimension
-! N+1-K.
-
-USE GLOBAL_PLP
-
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-INTEGER, DIMENSION(N), INTENT(IN OUT):: LEX_NUM, LEX_SAVE
-REAL (KIND=R8), INTENT(IN):: TOL
-REAL (KIND=R8), DIMENSION(N,N), INTENT(IN):: RAND_MAT
-REAL (KIND=R8), DIMENSION(N+1,N), INTENT(IN OUT):: MAT
-LOGICAL, INTENT(OUT):: NONSING
-
-! Local variables.
-INTEGER:: I, J, K
-REAL (KIND=R8), DIMENSION(N):: V
-REAL (KIND=R8):: WORK(1)
-
-IF (N == 1) THEN
-  LEX_SAVE = LEX_NUM
-  NONSING = .TRUE.
-  RETURN
-END IF
-
-! (Re)set MAT (in column form) from LEX_NUM.
-DO I=1,N
-  IF (LEX_SAVE(I) /= LEX_NUM(I)) THEN
-    LEX_SAVE(I+1:N) = 0
-    DO K=I,N
-      MAT(1:N+1,K) = 0.0_R8
-      DO J=1,NUMV(K,LEX_NUM(K))
-        MAT(PAR(K,LEX_NUM(K),J),K) = RAND_MAT(PAR(K,LEX_NUM(K),J),K)
-      END DO
-    END DO
-    EXIT
-  END IF
-END DO
-
-! Recompute QR factorization of MAT starting where first change in
-! LEX_NUM occurred.
-NONSING = .FALSE.
-IF (LEX_SAVE(1) /= LEX_NUM(1)) THEN
-  ! Skip QR factorization and prune tree if this set degree = 0.
-  IF (SD(1,LEX_NUM(1)) == 0) THEN
-    LEX_NUM(2:N) = PARTITION_SIZES(2:N)
-    LEX_SAVE = LEX_NUM
-    RETURN
-  ELSE
-    CALL DLARFG(N,MAT(1,1),MAT(2:N,1),1,MAT(N+1,1))
-  END IF
-END IF
-DO J=2,N
-  IF (LEX_SAVE(J) /= LEX_NUM(J)) THEN
-
-    ! Skip rest of QR factorization and prune tree if this set degree = 0.
-    IF (SD(J,LEX_NUM(J)) == 0) THEN
-      IF (J < N) LEX_NUM(J+1:N) = PARTITION_SIZES(J+1:N)
-      EXIT
-    END IF
-    DO K=1,J-1
-      V(K) = 1.0_R8
-      V(K+1:N) = MAT(K+1:N,K)
-      CALL DLARFX('L',N-K+1,1,V(K:N),MAT(N+1,K),MAT(K:N,J),N-K+1,WORK)
-    END DO
-    IF (J < N) CALL DLARFG(N-J+1,MAT(J,J),MAT(J+1:N,J),1,MAT(N+1,J))
-
-    ! Check singularity of subsystem corresponding to lexicographic
-    ! vector (LEX_NUM(1:J), *).
-    IF (ABS(MAT(J,J)) < TOL) THEN
-      IF (J < N) LEX_NUM(J+1:N) = PARTITION_SIZES(J+1:N)
-      EXIT
-    END IF
-  END IF
-
-  ! Subsystem corresponding to LEX_NUM is nonsingular when J==N here.
-  IF (J == N) NONSING = .TRUE.
-END DO
-
-! Save updated LEX_NUM for next call.
-LEX_SAVE = LEX_NUM
-RETURN
-END SUBROUTINE SINGSYS_PLP
-
-
-END MODULE POLSYS
-                                                                     !!!
-
-
-! ----------------------------------------------------------------------
-!
-! The following modules and external subroutines are from HOMPACK90.
-
-
-!  This module provides global allocatable arrays used for the sparse
-!  matrix data structures, and by the polynomial system solver.  The
-!  MODULE HOMOTOPY uses this module.
-!
-      MODULE HOMPACK90_GLOBAL
-      USE REAL_PRECISION
-      INTEGER, DIMENSION(:), ALLOCATABLE:: COLPOS, IPAR, ROWPOS
-      REAL (KIND=R8), DIMENSION(:), ALLOCATABLE:: PAR, PP, QRSPARSE
-      END MODULE HOMPACK90_GLOBAL
-
-
-      MODULE HOMOTOPY       ! Interfaces for user written subroutines.
-      USE REAL_PRECISION, ONLY : R8
-      USE HOMPACK90_GLOBAL
-!
-! Interface for subroutine that evaluates F(X) and returns it in the vector V.
-      INTERFACE
-         SUBROUTINE F(X,V)
-         USE REAL_PRECISION
-         REAL (KIND=R8), DIMENSION(:), INTENT(IN):: X
-         REAL (KIND=R8), DIMENSION(:), INTENT(OUT):: V
-         END SUBROUTINE F
-      END INTERFACE
-!
-! Interface for subroutine that returns in V the K-th column of the Jacobian 
-! matrix of F(X) evaluated at X. 
-      INTERFACE
-         SUBROUTINE FJAC(X,V,K)
-         USE REAL_PRECISION
-         REAL (KIND=R8), DIMENSION(:), INTENT(IN):: X
-         REAL (KIND=R8), DIMENSION(:), INTENT(OUT):: V
-         INTEGER, INTENT(IN):: K
-         END SUBROUTINE FJAC
-      END INTERFACE
-!
-! Interface for subroutine that evaluates RHO(A,LAMBDA,X) and returns it 
-! in the vector V.
-      INTERFACE
-         SUBROUTINE RHO(A,LAMBDA,X,V)
-         USE REAL_PRECISION
-         REAL (KIND=R8), INTENT(IN):: A(:),X(:)
-         REAL (KIND=R8), INTENT(IN OUT):: LAMBDA
-         REAL (KIND=R8), INTENT(OUT):: V(:)
-         END SUBROUTINE RHO
-      END INTERFACE
-! The following code is specifically for the polynomial system driver
-! POLSYS1H, and should be used verbatim with POLSYS1H in the external 
-! subroutine RHO.  
-!     USE HOMPACK90_GLOBAL, ONLY: IPAR, PAR  ! FOR POLSYS1H ONLY.
-!     INTERFACE
-!       SUBROUTINE HFUNP(N,A,LAMBDA,X)
-!       USE REAL_PRECISION
-!       INTEGER, INTENT(IN):: N
-!       REAL (KIND=R8), INTENT(IN):: A(2*N),LAMBDA,X(2*N)
-!       END SUBROUTINE HFUNP
-!     END INTERFACE
-!     INTEGER:: J,NPOL
-! FORCE PREDICTED POINT TO HAVE  LAMBDA .GE. 0  .
-!     IF (LAMBDA .LT. 0.0) LAMBDA=0.0
-!     NPOL=IPAR(1)
-!     CALL HFUNP(NPOL,A,LAMBDA,X)
-!     DO J=1,2*NPOL
-!       V(J)=PAR(IPAR(3 + (4-1)) + (J-1))
-!     END DO
-!     RETURN
-! If calling FIXP?? or STEP?? directly, supply appropriate replacement
-! code in the external subroutine RHO.
-!
-! Interface for subroutine that calculates and returns in A the vector
-! Z such that RHO(Z,LAMBDA,X) = 0 .
-      INTERFACE
-         SUBROUTINE RHOA(A,LAMBDA,X)
-         USE REAL_PRECISION
-         REAL (KIND=R8), DIMENSION(:), INTENT(OUT):: A
-         REAL (KIND=R8), INTENT(IN):: LAMBDA,X(:)
-         END SUBROUTINE RHOA
-      END INTERFACE
-!
-! Interface for subroutine that returns in the vector V the Kth column
-! of the Jacobian matrix [D RHO/D LAMBDA, D RHO/DX] evaluated at the
-! point (A, LAMBDA, X).
-      INTERFACE
-         SUBROUTINE RHOJAC(A,LAMBDA,X,V,K)
-         USE REAL_PRECISION
-         REAL (KIND=R8), INTENT(IN):: A(:),X(:)
-         REAL (KIND=R8), INTENT(IN OUT):: LAMBDA
-         REAL (KIND=R8), INTENT(OUT):: V(:)
-         INTEGER, INTENT(IN):: K
-         END SUBROUTINE RHOJAC
-      END INTERFACE
-! The following code is specifically for the polynomial system driver
-! POLSYS1H, and should be used verbatim with POLSYS1H in the external 
-! subroutine RHOJAC.  
-!     USE HOMPACK90_GLOBAL, ONLY: IPAR, PAR  ! FOR POLSYS1H ONLY.
-!     INTERFACE
-!       SUBROUTINE HFUNP(N,A,LAMBDA,X)
-!       USE REAL_PRECISION
-!       INTEGER, INTENT(IN):: N
-!       REAL (KIND=R8), INTENT(IN):: A(2*N),LAMBDA,X(2*N)
-!       END SUBROUTINE HFUNP
-!     END INTERFACE
-!     INTEGER:: J,NPOL,N2
-!     NPOL=IPAR(1)
-!     N2=2*NPOL
-!     IF (K .EQ. 1) THEN
-! FORCE PREDICTED POINT TO HAVE  LAMBDA .GE. 0  .
-!       IF (LAMBDA .LT. 0.0) LAMBDA=0.0
-!       CALL HFUNP(NPOL,A,LAMBDA,X)
-!       DO J=1,N2
-!         V(J)=PAR(IPAR(3 + (6-1)) + (J-1))
-!       END DO
-!       RETURN
-!     ELSE
-!       DO J=1,N2
-!         V(J)=PAR(IPAR(3 + (5-1)) + (J-1) + N2*(K-2))
-!       END DO
-!     ENDIF
-!
-!     RETURN
-! If calling FIXP?? or STEP?? directly, supply appropriate replacement
-! code in the external subroutine RHOJAC.
-!
-!
-! Interface for subroutine that evaluates a sparse Jacobian matrix of
-! F(X) at X, and operates as follows:
-!
-! If MODE = 1,
-! evaluate the N x N symmetric Jacobian matrix of F(X) at X, and return
-! the result in packed skyline storage format in QRSPARSE.  LENQR is the
-! length of QRSPARSE, and ROWPOS contains the indices of the diagonal
-! elements of the Jacobian matrix within QRSPARSE.  ROWPOS(N+1) and
-! ROWPOS(N+2) are set by subroutine FODEDS.  The allocatable array COLPOS
-! is not used by this storage format.
-!
-! If MODE = 2,
-! evaluate the N x N Jacobian matrix of F(X) at X, and return the result
-! in sparse row storage format in QRSPARSE.  LENQR is the length of
-! QRSPARSE, ROWPOS contains the indices of where each row begins within
-! QRSPARSE, and COLPOS (of length LENQR) contains the column indices of
-! the corresponding elements in QRSPARSE.  Even if zero, the diagonal
-! elements of the Jacobian matrix must be stored in QRSPARSE.
-      INTERFACE
-         SUBROUTINE FJACS(X)
-         USE REAL_PRECISION
-         USE HOMPACK90_GLOBAL, ONLY: QRSPARSE, ROWPOS, COLPOS
-         REAL (KIND=R8), DIMENSION(:), INTENT(IN):: X
-         END SUBROUTINE FJACS
-      END INTERFACE
-!
-!
-! Interface for subroutine that evaluates a sparse Jacobian matrix of
-! RHO(A,X,LAMBDA) at (A,X,LAMBDA), and operates as follows:
-!
-! If MODE = 1,
-! evaluate the N X N symmetric Jacobian matrix [D RHO/DX] at
-! (A,X,LAMBDA), and return the result in packed skyline storage format in
-! QRSPARSE.  LENQR is the length of QRSPARSE, and ROWPOS contains the
-! indices of the diagonal elements of [D RHO/DX] within QRSPARSE.  PP
-! contains -[D RHO/D LAMBDA] evaluated at (A,X,LAMBDA).  Note the minus
-! sign in the definition of PP.  The allocatable array COLPOS is not used
-! in this storage format.
-!
-! If MODE = 2,
-! evaluate the N X (N+1) Jacobian matrix [D RHO/DX, D RHO/DLAMBDA] at
-! (A,X,LAMBDA), and return the result in sparse row storage format in
-! QRSPARSE.  LENQR is the length of QRSPARSE, ROWPOS contains the indices
-! of where each row begins within QRSPARSE, and COLPOS (of length LENQR)
-! contains the column indices of the corresponding elements in QRSPARSE.
-! Even if zero, the diagonal elements of the Jacobian matrix must be
-! stored in QRSPARSE.  The allocatable array PP is not used in this
-! storage format.
-!
-      INTERFACE
-         SUBROUTINE RHOJS(A,LAMBDA,X)
-         USE REAL_PRECISION
-         USE HOMPACK90_GLOBAL, ONLY: QRSPARSE, ROWPOS, COLPOS
-         REAL (KIND=R8), INTENT(IN):: A(:),LAMBDA,X(:)
-         END SUBROUTINE RHOJS
-      END INTERFACE
-      END MODULE HOMOTOPY
-
-      SUBROUTINE STEPNX(N,NFE,IFLAG,START,CRASH,HOLD,H,RELERR,   &
-         ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-!
-!  STEPNX  takes one step along the zero curve of the homotopy map
-! using a predictor-corrector algorithm.  The predictor uses a Hermite
-! cubic interpolant, and the corrector returns to the zero curve along
-! the flow normal to the Davidenko flow.  STEPNX  also estimates a
-! step size H for the next step along the zero curve.  STEPNX  is an
-! expert user version of STEPN(F|S), written using the reverse call
-! protocol.  All matrix data structures and numerical linear algebra
-! are the responsibility of the calling program.  STEPNX  indicates to
-! the calling program, via flags, at which points  RHO(A,LAMBDA,X)  and
-! [ D RHO(A,LAMBDA,X)/D LAMBDA, D RHO(A,LAMBDA,X)/DX ]  must be
-! evaluated, and what linear algebra must be done with these functions.
-! Out of range arguments can also be signaled to  STEPNX , which will
-! attempt to modify its steplength algorithm to reflect this
-! information.
-!
-! The following interface block should be inserted in the calling
-! program:
-!
-!     INTERFACE
-!       SUBROUTINE STEPNX(N,NFE,IFLAG,START,CRASH,HOLD,H,RELERR,
-!    &    ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-!       USE HOMOTOPY
-!       USE REAL_PRECISION
-!       INTEGER, INTENT(IN):: N
-!       INTEGER, INTENT(IN OUT):: NFE,IFLAG
-!       LOGICAL, INTENT(IN OUT):: START,CRASH
-!       REAL (KIND=R8), INTENT(IN OUT):: HOLD,H,RELERR,ABSERR,S,RHOLEN,
-!    &    SSPAR(8)
-!       REAL (KIND=R8), DIMENSION(:), INTENT(IN):: A
-!       REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: Y,YP,YOLD,YPOLD,
-!    &    TZ,W,WP
-!       REAL (KIND=R8), DIMENSION(:), ALLOCATABLE, SAVE:: Z0,Z1
-!       END SUBROUTINE STEPNX
-!     END INTERFACE
-!
-! ON INPUT:
-!
-! N = dimension of X and the homotopy map.
-!
-! NFE = number of Jacobian matrix evaluations.
-!
-! IFLAG = -2, -1, or 0, indicating the problem type, on the first
-!         call to  STEPNX .  STEPNX  does not distinguish between
-!         these values, but they are permitted for consistency with
-!         the rest of HOMPACK.
-!
-!       = 0-10*R, -1-10*R, or -2-10*R, R = 1,2,3, indicate to  STEPNX
-!         where to resume after a reverse call.  The calling program
-!         must not modify  IFLAG  after a reverse call, except as
-!         noted next.
-!
-!       = -40, -41, or -42, used for a final call to deallocate working
-!         storage, after all path tracking is finished.  START  and
-!         IFLAG  are reset on return.
-!
-!       = -100-10*R, -101-10*R, -102-10*R, R = 1,2,3, indicate to
-!         STEPNX  where to resume after a reverse call, and that the
-!         requested evaluation point was out of range.  STEPNX  will
-!         reduce  H  and try again.
-!
-! START = .TRUE. on first call to  STEPNX , .FALSE. otherwise.
-!
-! HOLD = ||Y - YOLD||; should not be modified by the user.
-!
-! H = upper limit on length of step that will be attempted.  H  must be
-!    set to a positive number on the first call to  STEPNX .
-!    Thereafter  STEPNX  calculates an optimal value for  H , and  H
-!    should not be modified by the user.
-!
-! RELERR, ABSERR = relative and absolute error values.  The iteration is
-!    considered to have converged when a point W=(LAMBDA,X) is found 
-!    such that
-!
-!    ||Z|| <= RELERR*||W|| + ABSERR  ,          where
-!
-!    Z is the Newton step to W=(LAMBDA,X).
-!
-! S = (approximate) arc length along the homotopy zero curve up to
-!    Y(S) = (LAMBDA(S), X(S)).
-!
-! Y(1:N+1) = previous point (LAMBDA(S), X(S)) found on the zero curve of 
-!    the homotopy map.
-!
-! YP(1:N+1) = unit tangent vector to the zero curve of the homotopy map
-!    at  Y .
-!
-! YOLD(1:N+1) = a point before  Y  on the zero curve of the homotopy map.
-!
-! YPOLD(1:N+1) = unit tangent vector to the zero curve of the homotopy
-!    map at  YOLD .
-!
-! A(:) = parameter vector in the homotopy map.
-!
-! TZ(1:N+1), W(1:N+1), and WP(1:N+1)  are work arrays used for the
-!    Newton step calculation and the interpolation.  On reentry after
-!    a reverse call,  WP  and  TZ  contain the tangent vector and
-!    Newton step, respectively, at the point  W .  Precisely,
-!    D RHO(A,W)/DW WP = 0,  WP^T YP > 0,  ||WP|| = 1,
-!    and  TZ  is the minimum norm solution of
-!    D RHO(A,W)/DW TZ = - RHO(A,W).
-!
-! RHOLEN = ||RHO(A,W)||_2 is required by some reverse calls.
-!
-! SSPAR(1:8) = (LIDEAL, RIDEAL, DIDEAL, HMIN, HMAX, BMIN, BMAX, P)  is
-!    a vector of parameters used for the optimal step size estimation.
-!    If  SSPAR(J) .LE. 0.0  on input, it is reset to a default value
-!    by  STEPNX .  Otherwise the input value of  SSPAR(J)  is used.
-!    See the comments below in  STEPNX  for more information about
-!    these constants.
-!
-!
-! ON OUTPUT:
-!
-! N  and  A  are unchanged.
-!
-! NFE  has been updated.
-!
-! IFLAG  
-!    = -22, -21, -20, -32, -31, or -30 requests the calling program to
-!      return the unit tangent vector in  WP , the normal flow Newton
-!      step in  TZ , and the 2-norm of the homotopy map in  RHOLEN ,
-!      all evaluated at the point  W .
-!
-!    = -12, -11, or -10 requests the calling program to return in  WP
-!      the unit tangent vector at  W .
-!
-!    = -2, -1, or 0 (unchanged) on a normal return after a successful
-!      step.
-!
-!    = 4 if a Jacobian matrix with rank < N has occurred.  The
-!        iteration was not completed.
-!
-!    = 6 if the iteration failed to converge.  W  contains the last
-!        Newton iterate.
-!
-!    = 7 if input arguments or array sizes are invalid, or  IFLAG  was
-!        changed during a reverse call.
-!
-! START = .FALSE. on a normal return.
-!
-! CRASH 
-!    = .FALSE. on a normal return.
-!
-!    = .TRUE. if the step size  H  was too small.  H  has been
-!      increased to an acceptable value, with which  STEPNX  may be
-!      called again.
-!
-!    = .TRUE. if  RELERR  and/or  ABSERR  were too small.  They have
-!      been increased to acceptable values, with which  STEPNX  may
-!      be called again.
-!
-! HOLD = ||Y - YOLD||.
-!
-! H = optimal value for next step to be attempted.  Normally  H  should
-!    not be modified by the user.
-!
-! RELERR, ABSERR  are unchanged on a normal return.
-!
-! S = (approximate) arc length along the zero curve of the homotopy map 
-!    up to the latest point found, which is returned in  Y .
-!
-! Y, YP, YOLD, YPOLD  contain the two most recent points and tangent
-!    vectors found on the zero curve of the homotopy map.
-!
-! SSPAR  may have been changed to default values.
-!
-!
-! Z0(1:N+1), Z1(1:N+1)  are allocatable work arrays used for the
-!    estimation of the next step size  H .
-!
-! Calls  DNRM2 .
-!
-      USE HOMOTOPY
-      USE REAL_PRECISION
-      REAL (KIND=R8) HOLDH
-      INTEGER, INTENT(IN):: N
-      INTEGER, INTENT(IN OUT):: NFE,IFLAG
-      LOGICAL, INTENT(IN OUT):: START,CRASH
-      REAL (KIND=R8), INTENT(IN OUT):: HOLD,H,RELERR,ABSERR,S,RHOLEN,   &
-        SSPAR(8)
-      REAL (KIND=R8), DIMENSION(:), INTENT(IN):: A
-      REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: Y,YP,YOLD,YPOLD,   &
-        TZ,W,WP
-      REAL (KIND=R8), DIMENSION(:), ALLOCATABLE, SAVE:: Z0,Z1
-!
-! ***** LOCAL VARIABLES. *****
-!
-      REAL (KIND=R8), SAVE:: DCALC,DELS,F0,F1,FOURU,FP0,FP1,   &
-        HFAIL,HT,LCALC,RCALC,TEMP,TWOU
-      INTEGER, SAVE:: IFLAGC,ITNUM,J,JUDY,NP1
-      LOGICAL, SAVE:: FAIL
-!
-! ***** END OF SPECIFICATION INFORMATION. *****
-!
-! THE LIMIT ON THE NUMBER OF NEWTON ITERATIONS ALLOWED BEFORE REDUCING
-! THE STEP SIZE  H  MAY BE CHANGED BY CHANGING THE FOLLOWING PARAMETER 
-! STATEMENT:
-      INTEGER, PARAMETER:: LITFH=4
-!
-! DEFINITION OF HERMITE CUBIC INTERPOLANT VIA DIVIDED DIFFERENCES.
-!
-      REAL (KIND=R8):: DD001,DD0011,DD01,DD011,DNRM2,QOFS
-      DD01(F0,F1,DELS)=(F1-F0)/DELS
-      DD001(F0,FP0,F1,DELS)=(DD01(F0,F1,DELS)-FP0)/DELS
-      DD011(F0,F1,FP1,DELS)=(FP1-DD01(F0,F1,DELS))/DELS
-      DD0011(F0,FP0,F1,FP1,DELS)=(DD011(F0,F1,FP1,DELS) -    &
-                                  DD001(F0,FP0,F1,DELS))/DELS
-      QOFS(F0,FP0,F1,FP1,DELS,S)=((DD0011(F0,FP0,F1,FP1,DELS)*(S-DELS) +   &
-         DD001(F0,FP0,F1,DELS))*S + FP0)*S + F0
-!
-!
-      NP1=N+1
-      IF (IFLAG > 0) RETURN
-      IF ((START .AND. IFLAG < -2) .OR. SIZE(Y) /= NP1 .OR.   &
-        SIZE(YP) /= NP1 .OR. SIZE(YOLD) /= NP1 .OR.   &
-        SIZE(YPOLD) /= NP1 .OR. SIZE(TZ) /= NP1 .OR.   &
-        SIZE(W) /= NP1 .OR. SIZE(WP) /= NP1 .OR.   &
-        (.NOT. START .AND. -MOD(-IFLAG,100) /= IFLAGC .AND.   &
-        ABS(IFLAG)/10 /= 4)) THEN
-        IFLAG=7
-        RETURN
-      ENDIF
-      IFLAGC=-MOD(-IFLAG,10)
-!
-! PICK UP EXECUTION WEHRE IT LEFT OFF AFTER A REVERSE CALL.
-!
-      IF (IFLAG < -2) THEN
-        GO TO (50,100,400,700), MOD(ABS(IFLAG),100)/10
-      ENDIF
-      TWOU=2.0*EPSILON(1.0_R8)
-      FOURU=TWOU+TWOU
-      CRASH=.TRUE.
-! THE ARCLENGTH  S  MUST BE NONNEGATIVE.
-      IF (S .LT. 0.0) RETURN
-! IF STEP SIZE IS TOO SMALL, DETERMINE AN ACCEPTABLE ONE.
-      IF (H .LT. FOURU*(1.0+S)) THEN
-        H=FOURU*(1.0+S)
-        RETURN
-      ENDIF
-! IF ERROR TOLERANCES ARE TOO SMALL, INCREASE THEM TO ACCEPTABLE VALUES.
-      TEMP=DNRM2(NP1,Y,1)+1.0
-      IF (.5*(RELERR*TEMP+ABSERR) .LT. TWOU*TEMP) THEN
-        IF (RELERR .NE. 0.0) THEN
-          RELERR=FOURU*(1.0+FOURU)
-          ABSERR=MAX(ABSERR,0.0_R8)
-        ELSE
-          ABSERR=FOURU*TEMP
-        ENDIF
-        RETURN
-      ENDIF
-      CRASH=.FALSE.
-      IF (.NOT. START) GO TO 300
-!
-! *****  STARTUP SECTION (FIRST STEP ALONG ZERO CURVE).  *****
-!
-      FAIL=.FALSE.
-      START=.FALSE.
-      IF (ALLOCATED(Z0)) DEALLOCATE(Z0)
-      IF (ALLOCATED(Z1)) DEALLOCATE(Z1)
-      ALLOCATE(Z0(NP1),Z1(NP1))
-!
-! SET OPTIMAL STEP SIZE ESTIMATION PARAMETERS.
-! LET Z[K] DENOTE THE NEWTON ITERATES ALONG THE FLOW NORMAL TO THE
-! DAVIDENKO FLOW AND Y THEIR LIMIT.
-! IDEAL CONTRACTION FACTOR:  ||Z[2] - Z[1]|| / ||Z[1] - Z[0]||
-      IF (SSPAR(1) .LE. 0.0) SSPAR(1)= .5
-! IDEAL RESIDUAL FACTOR:  ||RHO(A, Z[1])|| / ||RHO(A, Z[0])||
-      IF (SSPAR(2) .LE. 0.0) SSPAR(2)= .01
-! IDEAL DISTANCE FACTOR:  ||Z[1] - Y|| / ||Z[0] - Y||
-      IF (SSPAR(3) .LE. 0.0) SSPAR(3)= .5
-! MINIMUM STEP SIZE  HMIN .
-      IF (SSPAR(4) .LE. 0.0) SSPAR(4)=(SQRT(N+1.0)+4.0)*EPSILON(1.0_R8)
-! MAXIMUM STEP SIZE  HMAX .
-      IF (SSPAR(5) .LE. 0.0) SSPAR(5)= 1.0
-! MINIMUM STEP SIZE REDUCTION FACTOR  BMIN .
-      IF (SSPAR(6) .LE. 0.0) SSPAR(6)= .1_R8
-! MAXIMUM STEP SIZE EXPANSION FACTOR  BMAX .
-      IF (SSPAR(7) .LE. 0.0) SSPAR(7)= 3.0
-! ASSUMED OPERATING ORDER  P .
-      IF (SSPAR(8) .LE. 0.0) SSPAR(8)= 2.0
-!
-! DETERMINE SUITABLE INITIAL STEP SIZE.
-      H=MIN(H, .10_R8, SQRT(SQRT(RELERR*TEMP+ABSERR)))
-! USE LINEAR PREDICTOR ALONG TANGENT DIRECTION TO START NEWTON ITERATION.
-      YPOLD(1)=1.0
-      YPOLD(2:NP1)=0.0
-! REQUEST TANGENT VECTOR AT Y VIA REVERSE CALL.
-      W=Y
-      YP=YPOLD
-      IFLAG=IFLAGC-10
-      IFLAGC=IFLAG
-      NFE=NFE+1
-      RETURN
- 50   YP=WP
-! IF THE STARTING POINT IS OUT OF RANGE, GIVE UP.
-      IF (IFLAG .LE. -100) THEN
-        IFLAG=6
-        RETURN
-      ENDIF
- 70   W=Y + H*YP
-      Z0=W
-      JUDY=1                                    ! DO JUDY=1,LITFH
- 80   IF (JUDY > LITFH) GO TO 200
-! REQUEST THE CALCULATION OF THE NEWTON STEP  TZ  AT THE CURRENT
-! POINT  W  VIA REVERSE CALL.
-        IFLAG=IFLAGC-20
-        IFLAGC=IFLAG
-        NFE=NFE+1
-        RETURN
-100     IF (IFLAG .LE. -100) GO TO 200
-!
-! TAKE NEWTON STEP AND CHECK CONVERGENCE.
-        W=W + TZ
-        ITNUM=JUDY
-! COMPUTE QUANTITIES USED FOR OPTIMAL STEP SIZE ESTIMATION.
-        IF (JUDY .EQ. 1) THEN
-          LCALC=DNRM2(NP1,TZ,1)
-          RCALC=RHOLEN
-          Z1=W
-        ELSE IF (JUDY .EQ. 2) THEN
-          LCALC=DNRM2(NP1,TZ,1)/LCALC
-          RCALC=RHOLEN/RCALC
-        ENDIF
-! GO TO MOP-UP SECTION AFTER CONVERGENCE.
-        IF (DNRM2(NP1,TZ,1) .LE. RELERR*DNRM2(NP1,W,1)+ABSERR)   &
-                                                       GO TO 600
-!
-        JUDY=JUDY+1
-      GO TO 80                                   ! END DO
-!
-! NO CONVERGENCE IN  LITFH  ITERATIONS.  REDUCE  H  AND TRY AGAIN.
-200   IF (H .LE. FOURU*(1.0 + S)) THEN
-        IFLAG=6
-        RETURN
-      ENDIF
-      H=.5 * H
-      GO TO 70
-!
-! ***** END OF STARTUP SECTION. *****
-!
-! ***** PREDICTOR SECTION. *****
-!
-300   FAIL=.FALSE.
-! COMPUTE POINT PREDICTED BY HERMITE INTERPOLANT.  USE STEP SIZE  H
-! COMPUTED ON LAST CALL TO  STEPNX .
-320   DO J=1,NP1
-        HOLDH=HOLD+H
-        W(J)=QOFS(YOLD(J),YPOLD(J),Y(J),YP(J),HOLD,HOLDH)
-      END DO
-      Z0=W 
-!
-! ***** END OF PREDICTOR SECTION. *****
-!
-! ***** CORRECTOR SECTION. *****
-!
-      JUDY=1                          ! CORRECTOR: DO JUDY=1,LITFH
-350   IF (JUDY > LITFH) GO TO 500
-! REQUEST THE CALCULATION OF THE NEWTON STEP  TZ  AT THE CURRENT
-! POINT  W  VIA REVERSE CALL.
-        IFLAG=IFLAGC-30
-        IFLAGC=IFLAG
-        NFE=NFE+1
-        RETURN
-400     IF (IFLAG .LE. -100) GO TO 500
-!
-! TAKE NEWTON STEP AND CHECK CONVERGENCE.
-        W=W + TZ
-        ITNUM=JUDY
-! COMPUTE QUANTITIES USED FOR OPTIMAL STEP SIZE ESTIMATION.
-        IF (JUDY .EQ. 1) THEN
-          LCALC=DNRM2(NP1,TZ,1)
-          RCALC=RHOLEN
-          Z1=W
-        ELSE IF (JUDY .EQ. 2) THEN
-          LCALC=DNRM2(NP1,TZ,1)/LCALC
-          RCALC=RHOLEN/RCALC
-        ENDIF
-! GO TO MOP-UP SECTION AFTER CONVERGENCE.
-        IF (DNRM2(NP1,TZ,1) .LE. RELERR*DNRM2(NP1,W,1)+ABSERR)   &
-                                                       GO TO 600
-!
-        JUDY=JUDY+1
-      GO TO 350                              ! END DO CORRECTOR
-!
-! NO CONVERGENCE IN  LITFH  ITERATIONS.  RECORD FAILURE AT CALCULATED  H , 
-! SAVE THIS STEP SIZE, REDUCE  H  AND TRY AGAIN.
-500   FAIL=.TRUE.
-      HFAIL=H
-      IF (H .LE. FOURU*(1.0 + S)) THEN
-        IFLAG=6
-        RETURN
-      ENDIF
-      H=.5 * H
-      GO TO 320
-!
-! ***** END OF CORRECTOR SECTION. *****
-!
-! ***** MOP-UP SECTION. *****
-!
-! YOLD  AND  Y  ALWAYS CONTAIN THE LAST TWO POINTS FOUND ON THE ZERO
-! CURVE OF THE HOMOTOPY MAP.  YPOLD  AND  YP  CONTAIN THE TANGENT
-! VECTORS TO THE ZERO CURVE AT  YOLD  AND  Y , RESPECTIVELY.
-!
-600   YPOLD=YP
-      YOLD=Y
-      Y=W
-      YP=WP
-      W=Y - YOLD
-! UPDATE ARC LENGTH.
-      HOLD=DNRM2(NP1,W,1)
-      S=S+HOLD
-!
-! ***** END OF MOP-UP SECTION. *****
-!
-! ***** OPTIMAL STEP SIZE ESTIMATION SECTION. *****
-!
-! CALCULATE THE DISTANCE FACTOR  DCALC .
-      TZ=Z0 - Y
-      W=Z1 - Y
-      DCALC=DNRM2(NP1,TZ,1)
-      IF (DCALC .NE. 0.0) DCALC=DNRM2(NP1,W,1)/DCALC
-!
-! THE OPTIMAL STEP SIZE HBAR IS DEFINED BY
-!
-!   HT=HOLD * [MIN(LIDEAL/LCALC, RIDEAL/RCALC, DIDEAL/DCALC)]**(1/P)
-!
-!     HBAR = MIN [ MAX(HT, BMIN*HOLD, HMIN), BMAX*HOLD, HMAX ]
-!
-! IF CONVERGENCE HAD OCCURRED AFTER 1 ITERATION, SET THE CONTRACTION
-! FACTOR  LCALC  TO ZERO.
-      IF (ITNUM .EQ. 1) LCALC = 0.0
-! FORMULA FOR OPTIMAL STEP SIZE.
-      IF (LCALC+RCALC+DCALC .EQ. 0.0) THEN
-        HT = SSPAR(7) * HOLD
-      ELSE 
-        HT = (1.0/MAX(LCALC/SSPAR(1), RCALC/SSPAR(2), DCALC/SSPAR(3)))   &
-             **(1.0/SSPAR(8)) * HOLD
-      ENDIF
-!  HT  CONTAINS THE ESTIMATED OPTIMAL STEP SIZE.  NOW PUT IT WITHIN
-! REASONABLE BOUNDS.
-      H=MIN(MAX(HT,SSPAR(6)*HOLD,SSPAR(4)), SSPAR(7)*HOLD, SSPAR(5))
-      IF (ITNUM .EQ. 1) THEN
-! IF CONVERGENCE HAD OCCURRED AFTER 1 ITERATION, DON'T DECREASE  H .
-        H=MAX(H,HOLD)
-      ELSE IF (ITNUM .EQ. LITFH) THEN
-! IF CONVERGENCE REQUIRED THE MAXIMUM  LITFH  ITERATIONS, DON'T
-! INCREASE  H .
-        H=MIN(H,HOLD)
-      ENDIF
-! IF CONVERGENCE DID NOT OCCUR IN  LITFH  ITERATIONS FOR A PARTICULAR
-! H = HFAIL , DON'T CHOOSE THE NEW STEP SIZE LARGER THAN  HFAIL .
-      IF (FAIL) H=MIN(H,HFAIL)
-!
-!
-      IFLAG=IFLAGC
-      RETURN
-! CLEAN UP ALLOCATED WORKING STORAGE.
- 700  START=.TRUE.
-      IFLAG=IFLAGC
-      IF (ALLOCATED(Z0)) DEALLOCATE(Z0)
-      IF (ALLOCATED(Z1)) DEALLOCATE(Z1)
-      RETURN
-      END SUBROUTINE STEPNX
diff --git a/sandbox/801/global_plp.mod b/sandbox/801/global_plp.mod
deleted file mode 100644
index 80ed0b7..0000000
--- a/sandbox/801/global_plp.mod
+++ /dev/null
@@ -1,130 +0,0 @@
-GFORTRAN module version '0' created from Src/polsys_plp.f90 on Fri Dec 10 14:53:52 2010
-MD5:11299312ebdf93e0f09f0a6dadc9b05a -- If you edit this, you'll get what you deserve.
-
-(() () () () () () () () () () () () () () () ()
-() () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'c' 'global_plp' 'c' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 3 0 (4 5) () 2 () () () 0 0)
-6 'd' 'global_plp' 'd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 7 0 (8 9 10) () 6 () () ()
-0 0)
-11 'global_plp' 'global_plp' 'global_plp' 1 ((MODULE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 ()
-() () 0 0)
-12 'large' 'global_plp' 'large' 1 ((PARAMETER UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-13 'numt' 'global_plp' 'numt' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 14 0 (15) () 13 () ()
-() 0 0)
-16 'numv' 'global_plp' 'numv' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 17 0 (18 19) () 16 ()
-() () 0 0)
-20 'par' 'global_plp' 'par' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 21 0 (22 23 24) () 20
-() () () 0 0)
-25 'partition' 'global_plp' 'partition' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 26 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-27 'partition_sizes' 'global_plp' 'partition_sizes' 1 ((VARIABLE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-26 'partition_type' 'global_plp' 'partition_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((28 'set' (DERIVED 29 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-30 'pi' 'global_plp' 'pi' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (REAL 8 0 0 REAL ()) 0 0 () (CONSTANT (REAL 8 0 0
-REAL ()) 0 '0.3243f6a8885a30@1') () 0 () () () 0 0)
-31 'polynomial' 'global_plp' 'polynomial' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 32 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-32 'polynomial_type' 'global_plp' 'polynomial_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((33 'term' (DERIVED 34 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ()) (35 'num_terms' (INTEGER 4 0 0
-INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN)
-UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-36 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-37 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-38 'sc' 'global_plp' 'sc' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 39 0 (40 41 42) () 38 () ()
-() 0 0)
-43 'sd' 'global_plp' 'sd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 44 0 (45 46) () 43 () () ()
-0 0)
-47 'selected_int_kind' '(intrinsic)' 'selected_int_kind' 1 ((PROCEDURE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 47 () () () 0 0)
-29 'set_type' 'global_plp' 'set_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((48 'index' (INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER)
-UNKNOWN-ACCESS ()) (49 'num_indices' (INTEGER 4 0 0 INTEGER ()) () (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ())
-(50 'set_deg' (INTEGER 4 0 0 INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (51 'start_coef' (
-COMPLEX 8 0 0 COMPLEX ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-34 'term_type' 'global_plp' 'term_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((52 'coef' (COMPLEX 8 0 0 COMPLEX ()) () (UNKNOWN-FL
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (53 'deg'
-(INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-4 'i' '' 'i' 3 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-5 'j' '' 'j' 3 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-9 'j' '' 'j' 7 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-8 'i' '' 'i' 7 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-10 'k' '' 'k' 7 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-22 'i' '' 'i' 21 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-15 'i' '' 'i' 14 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-23 'j' '' 'j' 21 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-24 'k' '' 'k' 21 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-41 'j' '' 'j' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-40 'i' '' 'i' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-42 'k' '' 'k' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-45 'i' '' 'i' 44 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-46 'j' '' 'j' 44 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-18 'i' '' 'i' 17 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-19 'j' '' 'j' 17 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-)
-
-('c' 0 2 'd' 0 6 'global_plp' 0 11 'large' 0 12 'numt' 0 13 'numv' 0 16
-'par' 0 20 'partition' 0 25 'partition_sizes' 0 27 'partition_type' 0 26
-'pi' 0 30 'polynomial' 0 31 'polynomial_type' 0 32 'r8' 0 36
-'real_precision' 0 37 'sc' 0 38 'sd' 0 43 'selected_int_kind' 0 47
-'set_type' 0 29 'term_type' 0 34)
diff --git a/sandbox/801/homotopy.mod b/sandbox/801/homotopy.mod
deleted file mode 100644
index c6663fd..0000000
--- a/sandbox/801/homotopy.mod
+++ /dev/null
@@ -1,131 +0,0 @@
-GFORTRAN module version '0' created from Src/polsys_plp.f90 on Fri Dec 10 14:53:52 2010
-MD5:70e2658538cc6f742a959a17cdb892fb -- If you edit this, you'll get what you deserve.
-
-(() () () () () ()
-() () () () () () () () () () () () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'colpos' 'hompack90_global' 'colpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-3 'f' 'homotopy' 'f' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC BODY
-UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN ())
-4 0 (5 6) () 0 () () () 0 0)
-7 'fjac' 'homotopy' 'fjac' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC BODY
-UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN ())
-8 0 (9 10 11) () 0 () () () 0 0)
-12 'fjacs' 'homotopy' 'fjacs' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 13 0 (14) () 0 () () () 0 0)
-15 'homotopy' 'homotopy' 'homotopy' 1 ((MODULE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 ()
-() () 0 0)
-16 'hompack90_global' 'hompack90_global' 'hompack90_global' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-17 'ipar' 'hompack90_global' 'ipar' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-18 'par' 'hompack90_global' 'par' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-19 'pp' 'hompack90_global' 'pp' 1 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-20 'qrsparse' 'hompack90_global' 'qrsparse' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-21 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-22 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-23 'rho' 'homotopy' 'rho' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC BODY
-UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN ())
-24 0 (25 26 27 28) () 0 () () () 0 0)
-29 'rhoa' 'homotopy' 'rhoa' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 30 0 (31 32 33) () 0 () () () 0 0)
-34 'rhojac' 'homotopy' 'rhojac' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 35 0 (36 37 38 39 40) () 0 () () () 0 0)
-41 'rhojs' 'homotopy' 'rhojs' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-BODY UNKNOWN EXTERNAL SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0 UNKNOWN
-()) 42 0 (43 44 45) () 0 () () () 0 0)
-46 'rowpos' 'hompack90_global' 'rowpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-47 'selected_real_kind' '(intrinsic)' 'selected_real_kind' 1 ((
-PROCEDURE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4
-0 0 REAL ()) 0 0 () () 47 () () () 0 0)
-5 'x' '' 'x' 4 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-36 'a' '' 'a' 35 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-37 'lambda' '' 'lambda' 35 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-31 'a' '' 'a' 30 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-32 'lambda' '' 'lambda' 30 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-38 'x' '' 'x' 35 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-39 'v' '' 'v' 35 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-40 'k' '' 'k' 35 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-28 'v' '' 'v' 24 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-33 'x' '' 'x' 30 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-10 'v' '' 'v' 8 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-11 'k' '' 'k' 8 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-9 'x' '' 'x' 8 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-25 'a' '' 'a' 24 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-26 'lambda' '' 'lambda' 24 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-27 'x' '' 'x' 24 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-6 'v' '' 'v' 4 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-14 'x' '' 'x' 13 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-43 'a' '' 'a' 42 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-44 'lambda' '' 'lambda' 42 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-45 'x' '' 'x' 42 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION
-DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 ASSUMED_SHAPE (CONSTANT (INTEGER 4
-0 0 INTEGER ()) 0 '1') ()) 0 () () () 0 0)
-)
-
-('colpos' 0 2 'f' 0 3 'fjac' 0 7 'fjacs' 0 12 'homotopy' 0 15
-'hompack90_global' 0 16 'ipar' 0 17 'par' 0 18 'pp' 0 19 'qrsparse' 0 20
-'r8' 0 21 'real_precision' 0 22 'rho' 0 23 'rhoa' 0 29 'rhojac' 0 34
-'rhojs' 0 41 'rowpos' 0 46 'selected_real_kind' 0 47)
diff --git a/sandbox/801/hompack90_global.mod b/sandbox/801/hompack90_global.mod
deleted file mode 100644
index 45f3d95..0000000
--- a/sandbox/801/hompack90_global.mod
+++ /dev/null
@@ -1,49 +0,0 @@
-GFORTRAN module version '0' created from Src/polsys_plp.f90 on Fri Dec 10 14:53:52 2010
-MD5:23af6302102066cb2c19b15dcb9683f2 -- If you edit this, you'll get what you deserve.
-
-(() () () () () () ()
-() () () () () () () () () () () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'colpos' 'hompack90_global' 'colpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-3 'hompack90_global' 'hompack90_global' 'hompack90_global' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-4 'ipar' 'hompack90_global' 'ipar' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-5 'par' 'hompack90_global' 'par' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-6 'pp' 'hompack90_global' 'pp' 1 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-7 'qrsparse' 'hompack90_global' 'qrsparse' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (REAL 8 0 0 REAL ())
-0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-8 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-9 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-10 'rowpos' 'hompack90_global' 'rowpos' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (INTEGER 4 0 0
-INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-11 'selected_real_kind' '(intrinsic)' 'selected_real_kind' 1 ((
-PROCEDURE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4
-0 0 REAL ()) 0 0 () () 11 () () () 0 0)
-)
-
-('colpos' 0 2 'hompack90_global' 0 3 'ipar' 0 4 'par' 0 5 'pp' 0 6
-'qrsparse' 0 7 'r8' 0 8 'real_precision' 0 9 'rowpos' 0 10
-'selected_real_kind' 0 11)
diff --git a/sandbox/801/lapack_plp.o b/sandbox/801/lapack_plp.o
deleted file mode 100644
index 73c2534..0000000
Binary files a/sandbox/801/lapack_plp.o and /dev/null differ
diff --git a/sandbox/801/makecui b/sandbox/801/makecui
deleted file mode 100644
index c91737a..0000000
--- a/sandbox/801/makecui
+++ /dev/null
@@ -1,50 +0,0 @@
-A := 1:
-eq := (1-z)^4*(a*z+1-a)^2*(b*z+1-b)^3*(c*z+1-c)^2*(d*z+1-d)^2-A*(z-a)^2*(z-b)^3*(z-c)^2*(z-d)^2+A^2*z^4*((1-a)*z-1)^2*((1-b)*z-1)^3*((1-c)*z-1)^2*((1-d)*z-1)^2:
-f := z^4*(((1-a)*z-1)/(z-a))^2*(((1-b)*z-1)/(z-b))^3*(((1-c)*z-1)/(z-c))^2*(((1-d)*z-1)/(z-d))^2:
-eqs := [seq(expand(coeff(eq,z,i)),i=0..13)]:
-eqs := [seq(expand(subs(z=i,eq)),i=1..4)]:
-
-vars := [a,b,c,d]:
-
-fd := fopen("INPUT.DAT",WRITE):
-
-fprintf(fd,"&PROBLEM  NEW_PROBLEM=.TRUE.\n"):
-fprintf(fd,"TITLE='Cui map'\n"):
-fprintf(fd,"\n"):
-fprintf(fd,"TRACKTOL = 1.0D-5  FINALTOL = 1.0D-14  SINGTOL = 0.0  SSPAR(5) = 1.0D0\n"):
-fprintf(fd,"NUMRR = 1\n"):
-fprintf(fd,"N = 4\n"):
-fprintf(fd,"\n"):
-
-for i from 1 to 4 do
-  fprintf(fd,"NUM_TERMS(%d) = %d\n",i,nops(eqs[i]));
-  for j from 1 to nops(eqs[i]) do
-    m := op(j,eqs[i]);
-    
-    fprintf(fd,"COEF(%d,%d) = (%f,%f) ",i,j,Re(coeffs(m)),Im(coeffs(m)));
-    for k from 1 to 4 do if degree(m,vars[k])>0 then
-      fprintf(fd," DEG(%d,%d,%d)=%d",i,j,k,degree(m,vars[k]));
-    fi; od;
-    fprintf(fd,"\n");
-  od;
-od:
-fprintf(fd,"/\n\n"):
-
-fprintf(fd,"&SYSPARTITION  ROOT_COUNT_ONLY = .FALSE.\n"):
-for i from 1 to 4 do
-  fprintf(fd,"P(%d) = 'all'\n",i);
-od:
-
-for i from 1 to 4 do
-  fprintf(fd,"\nNUM_SETS(%d) = 1\nNUM_INDICES(%d,1) = 4\n",i,i);
-  for j from 1 to 4 do
-    fprintf(fd," INDEX(%d,1,%d) = %d",i,j,j);
-  od;
-  fprintf(fd,"\n");
-od:
-
-fprintf(fd,"/\n"):
-
-fclose(fd):
-
-#awk 'BEGIN{printf "A := 1:eq := (1-z)^2*(a*z+1-a)^4*(b*z+1-b)^3*(c*z+1-c)^2*(d*z+1-d)^2-A*(z-a)^4*(z-b)^3*(z-c)^2*(z-d)^2+A^2*z^2*((1-a)*z-1)^4*((1-b)*z-1)^3*((1-c)*z-1)^2*((1-d)*z-1)^2:eqs := [seq(expand(coeff(eq,z,i)),i=0..13)]:\n"} $1 == "X(" && $2 ~ "[1-5])" {printf "%c := %s+I*(%s):",96+substr($2,1,1),substr($5,1,length($5)-1),substr($6,1,length($6)-1)} $1 == "X(" && $2 == "5)"{printf "\na:=a/e:b:=b/e:c:=c/e:d:=d/e:\nif abs(eqs[1])<0.1 then print(eqs); fi:\n"}' < OUTPUT.DAT > mapleout
diff --git a/sandbox/801/mapleout b/sandbox/801/mapleout
deleted file mode 100644
index 9f7ca00..0000000
--- a/sandbox/801/mapleout
+++ /dev/null
@@ -1,17503 +0,0 @@
-A := 1:eq := (1-z)^2*(a*z+1-a)^4*(b*z+1-b)^3*(c*z+1-c)^2*(d*z+1-d)^2-A*(z-a)^4*(z-b)^3*(z-c)^2*(z-d)^2+A^2*z^2*((1-a)*z-1)^4*((1-b)*z-1)^3*((1-c)*z-1)^2*((1-d)*z-1)^2:eqs := [seq(expand(coeff(eq,z,i)),i=0..13)]:
-a := 8.73774505000271E-01+I*(-1.78027492846066E-02):b := -9.23391776301353E+01+I*(-5.94505336439859E+01):c := 1.77169250836794E-01+I*(1.13878300653823E-01):d := 1.27303624903728E-01+I*(-1.52627890419471E-01):e := 2.02209916700262E-03+I*(-6.49911615506327E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.19657785464053E+05+I*(5.34970789863861E+04):b := 5.18786848249524E-01+I*(-4.20183814394979E-01):c := 4.90982569816649E-01+I*(1.34554684316547E-01):d := -1.45099128881154E+05+I*(-1.59273449288496E+05):e := -1.34649996404707E-06+I*(-2.12950995522379E-07):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.53174476009958E-01+I*(6.18827095202898E-02):b := 4.09233297743958E-01+I*(-1.04565914981216E-01):c := 3.92984741136529E-01+I*(-2.75377243675927E-02):d := -4.49360655874629E-01+I*(2.01585424565589E-01):e := -3.84858577436797E-01+I*(1.25128158385427E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26532954857455E-01+I*(1.08022120386377E-01):b := -1.98728427828564E-01+I*(-7.01116257996108E+00):c := 7.42968766373728E-01+I*(5.19322066086527E-03):d := -3.75422690026396E-01+I*(-2.37705357194215E-02):e := -7.85239865148045E-02+I*(-7.08273495268386E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.42208038651526E+07+I*(-8.84830563882518E+07):b := 2.85991226026763E+07+I*(-8.42447380084971E+07):c := 5.53162677007684E-01+I*(3.60390391314155E-02):d := 3.28210901584077E-01+I*(1.83368462269561E-02):e := 2.51695437403351E-09+I*(-5.96044851040693E-09):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02037030233975E-01+I*(-2.28816052331010E-01):b := 1.86322572259630E+08+I*(-5.70585352568220E+07):c := -1.53491196673220E+08+I*(1.37732587890768E+08):d := 5.02974742743507E-01+I*(2.28071949718705E-01):e := -1.21583523603848E-10+I*(3.05596792142537E-09):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.93161280935186E-01+I*(-6.23095735718488E-04):b := -7.23583324600626E+12+I*(-4.31262547801477E+12):c := 5.14108375474878E+12+I*(3.21386240090143E+12):d := -4.73145252426274E+12+I*(8.38947726150483E+11):e := -1.21260803048057E-13+I*(-6.48574076389519E-14):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.27581289372917E-01+I*(5.86029463084801E-03):b := 1.38761494011310E+07+I*(3.73240531787945E+07):c := -7.38913013627013E+00+I*(2.86336325162410E+00):d := 6.66934110869275E+06+I*(7.57280135545004E+06):e := 6.92394105545886E-09+I*(2.02742030462177E-08):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.08869317220544E-01+I*(-5.39976220665378E-03):b := -1.05874928157027E+02+I*(-6.32265658419463E+01):c := 3.27495885161707E-01+I*(-5.37627931148935E-03):d := -6.25072514586564E-01+I*(4.29160885170014E-02):e := 1.98990739280295E-03+I*(-5.73901698673091E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.88605876332919E-01+I*(7.05328695731924E-01):b := -3.66639418221828E-01+I*(-5.74169252726915E-01):c := 6.49175512613589E-01+I*(2.49192701995869E-02):d := 2.44110761879107E-01+I*(-1.52249860333980E+00):e := -5.62836249687786E-01+I*(3.58577498193768E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.05624897764902E+00+I*(2.26966675807215E+00):b := 3.40090926511003E-01+I*(-2.13121782747750E-01):c := 5.19140202515108E-01+I*(-7.56867209190402E-02):d := -1.22370392937019E+00+I*(-2.02079396365495E+00):e := -1.26084686048745E-01+I*(7.51529657737330E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.91414993469473E+01+I*(2.75098428117277E+01):b := 2.29849738208478E-01+I*(-9.21512304764318E-02):c := 9.10265775368542E-01+I*(-9.60504594824200E-03):d := -2.89983752782282E-01+I*(7.58838354875218E-01):e := -1.57336331328676E-02+I*(9.49754606801991E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.02138591731585E+01+I*(6.28803018528952E+00):b := 5.25969222323004E-01+I*(8.45044459421486E-02):c := 1.01402240211875E+00+I*(-1.38132602536881E-01):d := -1.21456187541441E-01+I*(3.74828633403479E-02):e := -1.98202796236914E-02+I*(-3.59932529768559E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03168438272847E+00+I*(1.66182327320593E-01):b := -7.11223457001524E-02+I*(-1.03899723926748E-01):c := 1.09209644441670E+00+I*(-2.85738165719801E-02):d := -5.52901807122688E-01+I*(4.83584543799504E-01):e := -2.97223018443209E-01+I*(3.35773460945030E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.76265591294048E-01+I*(-4.95539138959436E-03):b := -1.65071921707002E+00+I*(-4.23974247201725E-01):c := 9.80129670380075E-01+I*(-3.25168189354097E-02):d := -4.26924897256581E-01+I*(-2.14656557820483E-02):e := -3.67349904173280E-01+I*(-5.57048287919346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.22771996205410E-01+I*(-2.43109376913734E-03):b := 2.26804750083868E+02+I*(2.98500847710149E+02):c := -1.30412504091803E+02+I*(-2.35808609609254E+02):d := 7.69533934343156E+01+I*(1.30391657364403E+02):e := 4.87268582747606E-03+I*(1.56911953545131E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.54214827306992E-01+I*(2.80656805545501E-02):b := -1.56664331187312E+00+I*(1.04556234426488E-01):c := 9.04405994853875E-01+I*(-2.71184930110024E-02):d := -1.52263839501627E+00+I*(3.79217228842941E-01):e := -1.09980523691232E+00+I*(-1.64188730644341E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.65741551898435E-01+I*(-2.22420997009645E-01):b := 9.47598055315936E+07+I*(2.72159340167008E+07):c := 2.65210877173934E-01+I*(-1.37154496089518E-01):d := 2.46599533816445E+07+I*(-2.74991629595434E+06):e := -4.89895011980979E-09+I*(7.12349332787025E-09):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21339163112767E+02+I*(1.40673291763113E+02):b := 1.02919478061372E+00+I*(7.46544739392852E-02):c := 1.17887987054059E-01+I*(6.60648500749116E-02):d := 1.97894930492788E+02+I*(-3.55087212885785E+01):e := 2.06007904087186E-03+I*(1.55592302757050E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.83251104318546E-01+I*(6.01553789565824E-01):b := 7.16576756107939E-02+I*(-1.26290486250594E-01):c := 9.48090034559349E-01+I*(4.51622902763234E-02):d := 1.01694562436301E+00+I*(-1.14422933824959E+00):e := -4.44272419671474E-01+I*(3.82819671190604E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.93168464221133E+04+I*(1.10209197165675E+06):b := 4.58215578459210E-01+I*(1.98773326295657E-01):c := 1.74615568965987E+00+I*(-1.14156861476865E+00):d := 4.33716701926171E+05+I*(-6.40596373992553E+05):e := -1.08925751227053E-07+I*(6.58849954336032E-07):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59869893904869E+05+I*(-3.72949167772211E+05):b := 4.31550926839286E-01+I*(-8.85162259690751E-02):c := 8.73665294925541E-01+I*(7.59376147914519E-01):d := -2.16610568541044E+05+I*(8.42742240720695E+03):e := -6.72148289527911E-07+I*(-1.21040089764215E-06):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.85770341077280E+10+I*(2.83068959120927E+11):b := 4.99675921071211E-01+I*(2.91753270889551E-01):c := 1.66315170897196E+11+I*(2.07255019484460E+11):d := -1.32085455879696E+10+I*(-2.08217647578551E+11):e := -2.92090218114924E-13+I*(1.11915999471274E-12):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.15475541191737E-01+I*(5.98571809879686E-02):b := 4.47718787857628E-01+I*(-5.53781278801504E-01):c := -3.22367484369300E+05+I*(-1.53588923373358E+05):d := 7.06610799055716E+04+I*(-1.66153716427945E+05):e := 1.42106122144294E-06+I*(-4.63142319721518E-07):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.55499742295199E+04+I*(1.82366155205837E+04):b := 3.43529800319853E-01+I*(-1.60956515578150E-01):c := 7.34609378379751E-01+I*(-1.28208503585942E-01):d := -1.79994293723400E+05+I*(6.61956453205478E+04):e := -4.64323773382674E-06+I*(2.33451545075228E-06):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02259839618148E-01+I*(2.60634033614930E-03):b := 5.64951342706271E+11+I*(-3.82076642584627E+10):c := -4.72729355573063E+11+I*(-6.41543020070570E+10):d := 2.44996619740899E+11+I*(1.18469321866635E+11):e := 2.33758726351369E-12+I*(3.60804094934331E-12):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.24549188082518E-01+I*(6.77297661742099E-01):b := 5.81516284917412E-01+I*(-4.60021080890329E-01):c := 5.13250298224028E-01+I*(4.39692040266630E-01):d := -4.66788734958669E-01+I*(-1.47307291034124E+00):e := -1.52478220583155E-01+I*(2.46146668040040E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00724118799052E+05+I*(5.84728983558024E+05):b := 4.23275782607355E-01+I*(-4.84464942908323E-01):c := 5.51893525508698E-01+I*(1.47768117533628E-01):d := 2.79923104766959E+05+I*(-7.54392892991191E+05):e := 3.11385159392597E-07+I*(9.37781300178425E-07):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.78975090405557E-01+I*(3.90005786586542E-01):b := 6.68293432338224E-01+I*(-5.16795510264698E-01):c := 8.12210912842868E-01+I*(5.43309248768093E-01):d := -9.45842741455804E-02+I*(-8.72369831582488E-01):e := -2.04686409662998E-01+I*(2.30954952185959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.70359916178301E+01+I*(2.61592661340191E+01):b := 1.99664945308143E-01+I*(2.02778989384402E-01):c := 8.99687253709498E-01+I*(-9.48697078023434E-02):d := 4.78833707251020E+01+I*(-4.97725754879511E+00):e := 9.20414186788339E-03+I*(5.28151011447889E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.03350275574818E+01+I*(3.47903805019741E+01):b := 2.91383922355798E-01+I*(2.54452883384050E-01):c := 8.74128772011452E-01+I*(-7.70368962260299E-02):d := 4.16228186572672E+01+I*(-9.76501187811407E-01):e := 8.63177283239113E-03+I*(7.99622455349849E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.73274719323774E+01+I*(1.21016591734755E+01):b := -1.91792728501019E-02+I*(4.28787949649055E-01):c := 8.89726452010186E-01+I*(-5.38721660821414E-02):d := 3.39375509669425E-01+I*(-2.28184978243351E-01):e := 1.39243611678715E-02+I*(1.59200120514534E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71039263160393E+07+I*(-5.96753407085138E+07):b := 4.56659749373676E-01+I*(-3.23601178249872E-01):c := 8.90463102647715E+07+I*(-1.10414238815023E+08):d := 2.54141960120887E+07+I*(-2.55315581860430E+07):e := -1.06111367338246E-09+I*(-3.18800711269227E-09):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.58998163829602E-01+I*(6.59225990285557E-01):b := 3.71827914019208E-01+I*(-4.69097763670720E-02):c := 1.49196573635859E+00+I*(-7.05287589327199E-02):d := -2.74193699916651E+00+I*(4.07506561457679E-01):e := -1.49875802996331E-01+I*(1.05308163984821E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08477592625242E-01+I*(9.17904635534672E-02):b := 8.88928099794435E-01+I*(1.27773129527877E-02):c := -1.12511416402297E+00+I*(5.78597474443001E-01):d := 1.03991240974106E+00+I*(-3.39741783831713E-01):e := 2.09429390836625E-01+I*(2.62486403975192E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.02201708663401E-03+I*(6.38274489418644E-01):b := 5.95261329959345E-01+I*(-9.08101346565338E-02):c := 5.69874529354796E+05+I*(-6.28722971068312E+05):d := -1.26192778374769E+06+I*(4.05549925866318E+05):e := -6.36641443096378E-07+I*(-1.63900894800781E-07):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.16489803352743E+06+I*(-5.66491856349606E+05):b := 5.26198017581431E-01+I*(8.10773707135345E-02):c := 1.45583093022821E+00+I*(3.08577006225772E+00):d := -1.06263862322678E+07+I*(6.54354607343077E+05):e := -8.98993367560454E-08+I*(1.84034047956915E-08):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.71614571496222E-01+I*(6.79730367788321E-01):b := 3.67044747465184E-01+I*(-1.57393112234164E-01):c := 1.12083707005282E+00+I*(2.99740423183243E-01):d := 5.98551705454921E-01+I*(-7.73757235250999E-01):e := -1.81764180466755E-01+I*(3.14414383818393E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.11274863723741E-01+I*(7.44142609126455E-01):b := 4.94136814033057E-01+I*(1.82630401369190E-01):c := 1.69964445087297E+00+I*(6.98521130653465E-01):d := 5.14417203742461E-01+I*(-6.14594124954748E-01):e := -9.76846388528544E-02+I*(2.20174063825109E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.94918498536754E+11+I*(-2.84199736938392E+11):b := 4.83374055225208E-01+I*(-3.47950456656246E-01):c := 1.57861819094177E+11+I*(-1.04283304732753E+12):d := -8.39545791574568E+11+I*(3.38135608107530E+11):e := -2.20793381407874E-13+I*(-2.80744232115243E-13):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.49657074807104E+10+I*(-5.64309510216589E+11):b := 5.10972136916342E-01+I*(-2.84540671001529E-01):c := -7.24838755874401E+11+I*(-2.57099607693670E+11):d := 5.74360539797453E+10+I*(6.30312964561825E+11):e := 3.67099634111107E-13+I*(-4.12688221269886E-13):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.20124502390816E-02+I*(-1.64174613423621E-03):b := 6.90050549514450E-01+I*(9.73584882631200E-02):c := 1.31058621539715E+00+I*(5.89846235947335E-01):d := -9.00286380653781E-01+I*(7.63963242604621E-01):e := -1.81230894588046E-01+I*(1.69408919343003E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.24588029834688E+10+I*(1.26001336979894E+10):b := 5.14601716217734E-01+I*(-2.37867833235373E-01):c := 2.35107646063238E+10+I*(-5.10505086555639E+09):d := -1.50329060448886E+10+I*(-1.92736204882961E+10):e := -1.68736468482596E-11+I*(4.75758272838397E-12):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.24102707486302E-01+I*(1.50251894805204E-01):b := 1.67098537901945E-01+I*(-1.12515812315670E+00):c := -7.41181352976748E-01+I*(1.14201275364656E+00):d := 6.15793160172194E-01+I*(-4.83789615644455E-01):e := -8.05127155029572E-02+I*(7.59080387817449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76970992877958E+08+I*(2.00057550452076E+08):b := -2.70511845160208E+07+I*(1.36864386010098E+08):c := 4.99928968989852E-01+I*(-6.49456414546819E-04):d := -6.61209412471683E+08+I*(-1.96968444676285E+08):e := -4.72469725723654E-10+I*(1.12671552708436E-09):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.60782612567564E+09+I*(2.89835659377732E+09):b := -8.14674197570577E+09+I*(1.91609756555123E+09):c := 4.96649043824282E-01+I*(-1.56024940730380E-03):d := 2.88346536483740E+10+I*(-7.69427854809476E+09):e := 2.67782898448737E-11+I*(-8.32788373851534E-12):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.47024183132394E-01+I*(2.18196551000856E-01):b := 4.72899027631185E-01+I*(2.64187090907558E-01):c := 7.44909637170692E-01+I*(1.61802556505259E-01):d := 4.60189607764068E-03+I*(-6.12226272048566E-01):e := -2.17917373617245E-01+I*(3.54114180131550E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.60177553654846E+11+I*(4.52410127908503E+11):b := 4.94847834255047E-01+I*(-2.41913967283793E-01):c := 4.53745777287624E+11+I*(8.98683220700463E+11):d := 5.44461113096744E+11+I*(-5.57594591078952E+11):e := -8.99814619516326E-15+I*(4.80577546074085E-13):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.75235247380370E+12+I*(-1.10218416774662E+13):b := 2.17348459681607E+00+I*(7.92009611648550E-02):c := -8.10242006129659E+12+I*(-1.33084204397560E+13):d := -7.49906153772912E+12+I*(1.20757073790122E+13):e := 8.30227813580775E-16+I*(-2.54263840884783E-14):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.98248823138006E+06+I*(2.38044654265854E+06):b := 5.09041481568416E-01+I*(-2.02224679263208E-01):c := 9.76849252632758E+06+I*(3.35808942241987E+06):d := 9.41704515314094E-02+I*(5.39392327775011E-01):e := -4.53706407826362E-08+I*(1.52486786116307E-08):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.59903702874473E-01+I*(2.98905049947197E-01):b := 7.09383593862346E-01+I*(9.12148647814218E-02):c := 6.80485638690916E-01+I*(-2.94992599039791E+00):d := 2.42555402919540E-01+I*(2.33489861314358E+00):e := -1.38944660660701E-01+I*(-2.29060676362258E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.30202049801965E+10+I*(-1.07491837254806E+10):b := 5.51977331030513E-01+I*(2.73004026835903E-01):c := -4.07420520919868E+10+I*(-7.66181638445457E+09):d := 1.18850531961419E+10+I*(3.92895244701927E+10):e := 1.14679724050326E-11+I*(-5.84781420336078E-12):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24866152476906E+01+I*(-7.04595543841550E+01):b := 6.73645223626593E+00+I*(-1.70403847738183E+01):c := 4.95545349630753E-01+I*(1.76682313776289E-01):d := 4.95179361094054E-01+I*(-2.02579503409837E-01):e := -5.86748189753861E-04+I*(-7.89774482488490E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.55119881604980E-02+I*(-2.05020793348992E-01):b := 1.23982973000438E-01+I*(-1.57507521033204E+00):c := 5.44386718231245E-01+I*(-5.68792965199286E-02):d := 1.14752374695402E+00+I*(-1.40583658070113E-01):e := -2.87505876275361E-01+I*(-3.92718206822957E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.84055505181367E-01+I*(-5.76374762246880E-04):b := -8.62156793674179E-01+I*(-1.39454294466049E+00):c := 1.15745852412846E+00+I*(2.11714697956054E+00):d := 2.82322909036331E+00+I*(-1.67382458847542E+00):e := -1.10099342962487E+00+I*(7.12171578801836E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.44591709506064E+09+I*(1.01766907955606E+10):b := 4.91327222961618E-01+I*(-2.86247934299357E-01):c := 2.48056434939687E+10+I*(2.24806429534427E+10):d := 9.69913350164969E+09+I*(-2.71337011510527E+10):e := -1.05684106214629E-11+I*(1.33345253242045E-11):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.82831332875257E-02+I*(-1.39067936449506E-01):b := 7.65270848375385E-01+I*(4.06524131752733E-02):c := 3.70994337598476E-01+I*(7.05492207262548E-01):d := 4.29483219354324E-01+I*(-1.89962033540251E-01):e := -8.74764461216733E-02+I*(4.12694838406142E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.03984690844369E+10+I*(-9.13820557308032E+09):b := 4.96169125336075E-01+I*(-2.90026322849592E-01):c := -2.51913404449782E+10+I*(2.01371845561902E+10):d := 1.21952874025839E+10+I*(1.28491474333757E+10):e := 1.70449601156510E-11+I*(4.83415288051250E-12):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.27215753901123E+05+I*(-1.22088337838693E+06):b := -1.35616880433562E+00+I*(-7.65073538669890E-01):c := -4.28282630106225E+06+I*(1.44531625611310E+06):d := 6.93975534572597E-01+I*(-4.45233498064966E-02):e := 1.66182300154042E-07+I*(6.62139815378474E-09):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.11420184084560E+05+I*(1.83017204590420E+06):b := 1.01896468155369E-01+I*(1.24091316216731E-02):c := 9.49741947657641E+05+I*(-3.49800922072354E+06):d := -1.18974672804692E+00+I*(-3.26509999251193E-01):e := -1.54931124078135E-07+I*(-1.60912864401229E-07):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.32496979582523E-01+I*(-5.21651870491349E-01):b := 9.68640050349792E-01+I*(-1.06368212793160E+00):c := -1.26482856786198E+00+I*(5.74727168806143E-01):d := 5.96144741311220E-01+I*(7.51546786712690E-02):e := 1.28869232935933E+00+I*(7.45945926957845E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.97132668499853E+06+I*(-6.09904845691554E+06):b := -7.07031996891789E+06+I*(8.98172569262130E+05):c := 5.09323082520934E-01+I*(1.83218793452692E-01):d := 5.05934777073095E-01+I*(-1.97721500670266E-01):e := 3.91599204960528E-08+I*(-3.34663718415677E-08):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.26889879022790E-01+I*(-7.46411478539827E-04):b := -4.88061355092766E+01+I*(-8.40916305505393E+01):c := 3.59596618384188E+01+I*(1.23907552428381E+02):d := 5.36866650683864E+01+I*(-9.87036964377343E+01):e := -2.94409433641099E-03+I*(1.62598180029305E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.83031278559680E-01+I*(5.04867475995421E-02):b := -5.09574415588210E-01+I*(-7.32487237625428E-01):c := 7.84231226628023E-01+I*(5.30840797150595E-01):d := 2.29860584568110E-01+I*(-1.01328481974449E+00):e := -7.62343610349869E-01+I*(1.70708494770640E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.84641941686614E-01+I*(7.82366358537818E-02):b := -4.24579731475614E-01+I*(6.18676000243324E-02):c := 8.96297100287158E-01+I*(5.37785217948487E-01):d := 7.41214639111005E-01+I*(-7.50040632269273E-01):e := -6.05747127060973E-01+I*(5.84954381117441E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.37575163616014E-01+I*(-4.03893265147259E-01):b := 7.52987566156406E-01+I*(1.04255536409997E-01):c := 6.50813716230179E-02+I*(3.85574974197437E-01):d := 3.31254107184439E-01+I*(1.29491958295644E-01):e := -3.24153777306986E-01+I*(6.66655595871137E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.31266551624664E-01+I*(1.22006675552870E-01):b := -4.34685442064963E-01+I*(1.11589738474446E-01):c := 3.86220325791011E+00+I*(6.32382985672970E+00):d := 7.65427535303450E-01+I*(-2.28060394183185E-02):e := -4.81639858324906E-02+I*(7.34941191494667E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.36933095652084E-02+I*(-8.30204897189467E-01):b := 1.38151135711155E+06+I*(-1.49859084626415E+06):c := -8.26309630967618E+06+I*(-4.63270926799196E+06):d := 7.23725291291366E-01+I*(2.48655189356690E-02):e := 6.61239236646335E-08+I*(-4.38698395996266E-08):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.18234357358984E+11+I*(-8.00216892589429E+10):b := -8.17830886877269E-01+I*(-1.58864452090472E-01):c := 9.32767201362748E+10+I*(1.39578875425104E+11):d := 5.85944579921471E+10+I*(9.00857211907840E+10):e := 2.20402030502199E-12+I*(8.74728365912389E-12):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.95790985659160E+10+I*(-2.69823858549986E+11):b := -1.85660981447169E+11+I*(-2.75438163719736E+11):c := -2.50515830192558E+11+I*(4.44372534656292E+11):d := 4.95188975750945E-01+I*(7.52005108652604E-03):e := 1.79706447747847E-12+I*(-3.14222118377033E-13):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.80209647122049E+02+I*(-5.65328941466821E+02):b := -4.94985778281938E+03+I*(1.03832959489763E+03):c := 5.03896500008355E-01+I*(-5.55297945014023E-04):d := -1.24354644142406E+02+I*(-4.61027927597575E+02):e := 1.13047497498066E-04+I*(-5.77749720194880E-05):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.98702604060427E-01+I*(1.78986120162750E-02):b := 4.92314553238606E+02+I*(-8.87743789157237E+02):c := -8.07925392180625E+02+I*(7.01956554992924E+02):d := 7.41424053057487E+02+I*(-1.23167633545014E+02):e := 2.04187747243753E-03+I*(2.11366183025874E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.21736769297724E-01+I*(-1.70429014045038E-02):b := -4.64322686251743E-01+I*(-8.62334235858008E-01):c := 6.60176960692480E-01+I*(6.98082928123000E-01):d := 1.90974946721486E-01+I*(-6.94482605177060E-01):e := -6.70573833016408E-01+I*(1.20193915591619E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.06179505858168E-01+I*(6.02587066476602E-02):b := -7.00006902080793E-01+I*(-3.54022994295480E-01):c := 6.10707178313128E-01+I*(6.07928423745807E-01):d := 2.64238376174711E-01+I*(-5.63745679772626E-01):e := -9.08119020982240E-01+I*(4.19277863573662E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.40268062207498E-01+I*(-6.06777104764716E-03):b := 8.69365137043756E-02+I*(3.07979547530504E-02):c := 7.94836678889667E-01+I*(2.01812544099329E-01):d := -2.01690803293131E-01+I*(1.15161511129021E-01):e := -3.86461571546768E-01+I*(1.21832159858853E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.26273905979750E+00+I*(6.51692698791361E+00):b := -6.65889023291593E+00+I*(1.09990485483913E+01):c := 5.37296872519503E-01+I*(2.62029181909034E-01):d := 4.78471971813181E-01+I*(-2.31253390813447E-01):e := 2.00435997211512E-02+I*(7.75582942124987E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.03601362197231E-01+I*(-5.87355470450440E-01):b := 1.04019381123035E+01+I*(-1.19555949512047E+02):c := 3.39808728444501E-01+I*(7.22382567118982E-03):d := 6.67853126990964E-01+I*(5.89312743990205E-01):e := -4.31607858810528E-03+I*(-4.37827673765037E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.87916517329804E-01+I*(1.05326968482153E-02):b := -1.52324224876539E+00+I*(-1.79592964662359E-02):c := 3.27411968104616E+01+I*(1.36799624051913E+02):d := -9.08418956833525E+00+I*(1.36048394457887E+01):e := -1.43436474391908E-03+I*(4.25196110280723E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.78125184968820E-01+I*(2.48676971341595E-03):b := -5.24708654315012E+02+I*(-5.54643214482362E+02):c := 3.08985856505268E+02+I*(4.38046592247542E+02):d := -1.80477957783171E+02+I*(-2.41193927155365E+02):e := -2.23488844977662E-03+I*(-1.13763026327719E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.64246024383569E-01+I*(-3.20508881735880E+00):b := -4.05646965458474E+00+I*(-6.22315514835004E+02):c := 5.34733258383317E-01+I*(-3.63848955865992E-02):d := 2.66160845522654E+01+I*(-7.27917338544833E+01):e := -7.40058135706656E-04+I*(-1.00535520613341E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.86660721437764E-01+I*(-2.52551705263289E-02):b := -5.48317831398152E-01+I*(-2.41364032445342E+00):c := 3.23096386448506E-01+I*(8.26900966959008E-01):d := 7.33678540264351E-02+I*(-1.22421962792330E+00):e := -4.64285359264428E-01+I*(-2.43666993879656E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.12690277692478E-01+I*(7.93414638526227E-02):b := 6.48946903362626E-01+I*(-1.41593348829287E+00):c := -1.13597562418417E+00+I*(5.22963949415341E-01):d := 5.56858109784477E-01+I*(-5.07619850163898E-01):e := -7.90602572490116E-01+I*(2.02181452114295E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07628505433499E+00+I*(3.61259957007093E-01):b := 3.67764019978158E-01+I*(-1.18910603284896E-01):c := -2.34344500338674E-01+I*(7.78177670073139E-01):d := 7.59883311818242E-01+I*(-1.01598698662726E+00):e := -1.47899832324347E-01+I*(4.50542985656917E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.69107243820231E-01+I*(1.11031832645894E-01):b := 7.10268229139914E-01+I*(-7.37230726854385E-02):c := -1.78403577556583E-01+I*(4.26526923749660E-01):d := -5.04619966049332E-02+I*(3.81919848325197E-02):e := -2.84222697109057E-01+I*(3.35805741025605E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05222793209706E+00+I*(-5.08176838847628E-03):b := -1.16182266016051E-01+I*(-7.14064884742604E-02):c := 1.16458249384894E+00+I*(1.83127525339364E-01):d := -1.76733075884141E-01+I*(-7.49908986893509E-03):e := -3.41445186217467E-01+I*(4.24327499619103E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.86971116587551E-01+I*(-1.89341144704277E-01):b := -5.79163226289108E-01+I*(-1.92131581541530E-01):c := 2.61561594563988E+00+I*(-2.52630203016209E-01):d := 5.77384141255410E-01+I*(1.13182359696571E-01):e := -2.22467361518028E-01+I*(-8.34796865817263E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.03518447334929E-01+I*(-2.24065477146842E-02):b := -3.03078852215599E-02+I*(7.86087674867645E-01):c := 9.92361377675533E-01+I*(4.20271928836403E-01):d := -2.34827157089313E-01+I*(1.19529765510254E-01):e := -2.72555061006981E-01+I*(2.90863760344345E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.37564408036569E-01+I*(5.18494392397897E-02):b := -7.14817593561587E+08+I*(6.76027861599196E+08):c := 1.11475059646756E+09+I*(-1.62830850088236E+09):d := -4.17629865897659E-01+I*(-3.91212619306002E-01):e := -4.54138005955181E-11+I*(-3.89547089951845E-10):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.74907819233768E-01+I*(9.58729513487292E-02):b := 1.56058672476916E+07+I*(6.03201216597478E+07):c := 1.35456811333467E+07+I*(-5.09160404053452E+05):d := 5.86102711341252E+06+I*(1.38094118252136E+07):e := 1.77941082013392E-09+I*(1.48833468876651E-08):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.04172406099710E-01+I*(1.27966237530096E-02):b := -1.10377171013091E+02+I*(-7.23757039305412E+02):c := -3.39801324268309E+02+I*(4.11606528090040E+02):d := 1.33176668654150E+02+I*(-2.70391098423704E+02):e := 2.83671170888106E-03+I*(-2.52265747011013E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64561350594189E+02+I*(2.99760508577900E+02):b := -2.27972660282855E+00+I*(-4.24325980150699E-01):c := 6.27375249136410E-01+I*(-1.16974078604124E-02):d := -1.80907022180436E+02+I*(-4.18012396201677E+02):e := -1.13533344790227E-03+I*(9.67008803223018E-04):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.85077941705156E+01+I*(1.57858883118910E+02):b := 7.88565375127118E-01+I*(-1.07626516717660E-01):c := -2.95085296101440E-02+I*(1.43749560441461E-01):d := -1.00085230848531E+01+I*(-1.21830948941715E+02):e := -2.34741808589573E-03+I*(2.88079316903576E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.52532700287999E-01+I*(4.73730655523112E-01):b := 8.58971158705574E-01+I*(1.03652614289992E-02):c := -4.10019943161649E-02+I*(1.05133120581185E-01):d := -3.45644375000897E-01+I*(-1.90031496256645E-01):e := -2.31798552262492E-01+I*(2.44712442244770E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.53889458011293E-02+I*(1.30684053016450E+00):b := -6.30920368242696E-01+I*(-2.95501838464697E-01):c := 7.46672718651667E-01+I*(9.69711850964433E-03):d := -7.50870214371829E-02+I*(-3.67758208614063E-01):e := -2.06447569665456E-01+I*(3.93295913949595E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.44155600026041E+06+I*(1.27890928113177E+06):b := -2.49887192260661E+06+I*(-1.50257400639339E+06):c := 7.77486601351004E-01+I*(3.87239740879916E-03):d := -3.86845210366590E-01+I*(1.68039572222773E-02):e := 3.43213466474945E-07+I*(-1.29064934248759E-07):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.98707338635256E-01+I*(-1.87270170065425E-01):b := 5.39641320901446E+02+I*(6.82628912493129E+01):c := 4.86910324104492E-01+I*(1.97622423093521E-01):d := 5.40343588912093E+01+I*(3.47382044214665E+01):e := -1.01865007594489E-03+I*(9.88455365240024E-04):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.66095304220658E-01+I*(1.86748346726729E-01):b := 4.92503910207595E-01+I*(-4.64274764786659E-01):c := 4.11606787518455E+04+I*(-9.62614514318184E+04):d := 4.95125594689764E+04+I*(1.87256499280581E+04):e := -1.38192708815945E-06+I*(-4.90702872013506E-06):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.55613757548883E+09+I*(1.39721202990562E+10):b := -2.38785258583288E+10+I*(-4.68519089389156E+10):c := 4.99518743493645E-01+I*(-2.15665399366128E-04):d := -1.41783057868817E+10+I*(-2.81778292674342E+10):e := -7.02586949665081E-12+I*(-3.23434483405841E-11):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04451250396327E+00+I*(-2.94276537046628E+00):b := 9.97925141784334E+06+I*(1.12686028195846E+07):c := 4.58480895346798E-01+I*(-1.11072457843688E-02):d := 3.41361731331304E+06+I*(1.60549157885666E+06):e := -1.91391725292691E-09+I*(5.65622606363931E-08):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.22705279965636E-01+I*(1.53967309024485E+00):b := 5.08074147891700E-01+I*(-4.79595117251111E-01):c := 4.80272176327432E-01+I*(2.12539936543903E-01):d := -2.23871170265835E-01+I*(-1.86720381025545E+00):e := -1.24601138403053E-01+I*(2.02436939262872E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.19249632198092E+01+I*(2.76506764263968E+02):b := 8.38691645559635E-01+I*(-3.19124509526027E-02):c := -3.37653043377942E-02+I*(-1.51460370678101E-01):d := 5.18147230483622E+01+I*(-2.36596329399019E+02):e := -6.12299639549317E-04+I*(2.34931772694038E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.80252850072824E-01+I*(1.01133901785762E+00):b := 2.39618433632716E-01+I*(-1.09322259179800E-02):c := 6.50002249539251E-01+I*(2.23410628858215E-01):d := -2.34657231114135E-01+I*(-7.65971761126077E-01):e := -1.42303484554901E-01+I*(2.57963040775095E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.27534708841263E-01+I*(1.15931369140619E+00):b := -1.11139191887839E-01+I*(3.22234560482358E-02):c := 8.88003456032325E-01+I*(4.06221959163147E-01):d := -2.98104890448937E-01+I*(-7.21333692775927E-01):e := -1.04773634427963E-01+I*(2.52468860877186E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.61174905628962E-01+I*(1.11022477787376E+00):b := -4.07575059454924E-01+I*(-1.60180029280219E-01):c := 9.52814099691633E-01+I*(6.99247789506623E-01):d := -3.75401414567084E-01+I*(-7.27922317848752E-01):e := -7.13625949351103E-02+I*(2.63294650955459E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.50785556077277E-01+I*(8.87041525464649E-01):b := -5.10983532116206E-01+I*(-4.98114952791607E-01):c := 8.14108560058914E-01+I*(9.65378077251581E-01):d := -4.30378900778522E-01+I*(-7.82654745448566E-01):e := -4.43510814731853E-02+I*(2.89493610496594E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.52576311871266E-01+I*(5.94193858386650E-01):b := -3.72978636256314E-01+I*(-8.23457808046624E-01):c := 5.36788700668678E-01+I*(1.08008750305346E+00):d := -4.37312772278217E-01+I*(-8.59921064418240E-01):e := -3.19148304162858E-02+I*(3.34086395189906E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.65709258472888E-01+I*(3.68708454704841E-01):b := -5.81343964016626E-02+I*(-9.83977057288373E-01):c := 2.50615565796544E-01+I*(9.89702251726306E-01):d := -3.92958593530065E-01+I*(-9.23567505392380E-01):e := -5.73854084857447E-02+I*(3.91151709917929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22378433036792E-01+I*(3.16092440793062E-01):b := 2.86230068515792E-01+I*(-9.04563959823897E-01):c := 8.94927457093086E-02+I*(7.36514586886263E-01):d := -3.18070177712115E-01+I*(-9.43813191287786E-01):e := -1.35593343094739E-01+I*(4.09315691885223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22427712086616E-01+I*(5.23552450746053E-01):b := 5.33405025976309E-01+I*(-5.10571981411705E-01):c := 2.55801348722451E-01+I*(6.01900586703725E-01):d := -4.14045213768658E-02+I*(-1.13831732200902E+00):e := -9.75845273844444E-02+I*(3.29896264268177E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24270273158462E-01+I*(7.98126767960297E-01):b := 5.14996653688742E-01+I*(-1.57649246841502E-01):c := 4.77163839935276E-01+I*(3.99260007687405E-01):d := -8.46217600686956E-03+I*(-1.06808225596206E+00):e := -1.08025003495695E-01+I*(2.82078696159091E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.25793232097098E-01+I*(1.07392603428118E+00):b := 2.74040661432570E-01+I*(1.00872579205410E-01):c := 7.76992199655231E-01+I*(3.86317384782491E-01):d := -2.83731056133831E-02+I*(-9.93104142466839E-01):e := -8.87383101867367E-02+I*(2.49686534075452E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.26924909134462E-01+I*(1.22190070782975E+00):b := -7.67169640879846E-02+I*(1.44028261171626E-01):c := 1.01499340614830E+00+I*(5.69128715087422E-01):d := -9.18207649481843E-02+I*(-9.48466074116688E-01):e := -6.12565612588657E-02+I*(2.36482594295946E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.15634523604687E-01+I*(1.17281179429732E+00):b := -3.73152831655070E-01+I*(-4.83752241568286E-02):c := 1.07980404980761E+00+I*(8.62154545430899E-01):d := -1.69117289066332E-01+I*(-9.55054699189514E-01):e := -3.36513134283909E-02+I*(2.37844946024239E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.05245174053002E-01+I*(9.49628541888209E-01):b := -4.76561304316352E-01+I*(-3.86310147668217E-01):c := 9.41098510174894E-01+I*(1.12828483317586E+00):d := -2.24094775277769E-01+I*(-1.00978712678933E+00):e := -9.00398383916655E-03+I*(2.52274906543131E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.07035929846992E-01+I*(6.56780874810210E-01):b := -3.38556408456459E-01+I*(-7.11653002923234E-01):c := 6.63778650784658E-01+I*(1.24299425897774E+00):d := -2.31028646777465E-01+I*(-1.08705344575900E+00):e := 7.32865855203992E-03+I*(2.81502137981979E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.20168876448613E-01+I*(4.31295471128401E-01):b := -2.37121686018083E-02+I*(-8.72172252164982E-01):c := 3.77605515912524E-01+I*(1.15260900765058E+00):d := -1.86674468029313E-01+I*(-1.15069988673314E+00):e := 9.03614708019554E-04+I*(3.23990963646743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32081184938934E-01+I*(3.78679457216623E-01):b := 3.20652296315647E-01+I*(-7.92759154700506E-01):c := 2.16482695825289E-01+I*(8.99421342810538E-01):d := -1.11786052211362E-01+I*(-1.17094557262855E+00):e := -4.48459667195959E-02+I*(3.53334971014825E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12729822946178E-01+I*(4.07933397288352E-01):b := 4.87907238865429E-01+I*(-4.02798350205378E-01):c := 2.48366850098400E-01+I*(8.08321968315319E-01):d := 2.62616167151083E-01+I*(-1.17971394064059E+00):e := -1.79641937520311E-02+I*(3.33140613025395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08872618743318E-02+I*(6.82507714502595E-01):b := 4.69498866577863E-01+I*(-4.98756156351753E-02):c := 4.69729341311226E-01+I*(6.05681389298999E-01):d := 2.95558512521079E-01+I*(-1.10947887459362E+00):e := -4.67411450667733E-02+I*(2.95889563657528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09364302935696E-01+I*(9.58306980823480E-01):b := 2.28542874321691E-01+I*(2.08646210411737E-01):c := 7.69557701031180E-01+I*(5.92738766394085E-01):d := 2.75647582914566E-01+I*(-1.03450076109840E+00):e := -4.13947786590796E-02+I*(2.59237693354755E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.62082444167257E-01+I*(1.10628165437205E+00):b := -1.22214751198864E-01+I*(2.51801892377953E-01):c := 1.00755890752425E+00+I*(7.75550096699016E-01):d := 2.12199923579765E-01+I*(-9.89862692748253E-01):e := -2.07543782523257E-02+I*(2.38089867792507E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.50792058637481E-01+I*(1.05719274083961E+00):b := -4.18650618765949E-01+I*(5.93984070494986E-02):c := 1.07236955118356E+00+I*(1.06857592704249E+00):d := 1.34903399461616E-01+I*(-9.96451317821079E-01):e := 4.26657166419496E-03+I*(2.30997304515362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.40402709085797E-01+I*(8.34009488430507E-01):b := -5.22059091427231E-01+I*(-2.78536516461890E-01):c := 9.33664011550843E-01+I*(1.33470621478745E+00):d := 7.99259132501795E-02+I*(-1.05118374542089E+00):e := 2.96221755442732E-02+I*(2.36409926390058E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.42193464879786E-01+I*(5.41161821352508E-01):b := -3.84054195567338E-01+I*(-6.03879371716907E-01):c := 6.56344152160608E-01+I*(1.44941564058933E+00):d := 7.29920417504839E-02+I*(-1.12845006439057E+00):e := 5.14823980541527E-02+I*(2.55909629103863E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.55326411481408E-01+I*(3.15676417670699E-01):b := -6.92099557126876E-02+I*(-7.64398620958655E-01):c := 3.70171017288473E-01+I*(1.35903038926218E+00):d := 1.17346220498636E-01+I*(-1.19209650536471E+00):e := 5.95000593121247E-02+I*(2.91612396410144E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67238719971728E-01+I*(2.63060403758921E-01):b := 2.75154509204767E-01+I*(-6.84985523494179E-01):c := 2.09048197201238E-01+I*(1.10584272442213E+00):d := 1.92234636316586E-01+I*(-1.21234219126011E+00):e := 3.42409783525708E-02+I*(3.30794613587709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.18552450909311E-01+I*(1.68207714024894E-01):b := 3.83778357084576E-01+I*(-3.49484372728046E-01):c := 1.09986587265760E-01+I*(9.61671117040051E-01):d := 5.22118759730413E-01+I*(-1.01600485863308E+00):e := 6.25756523856672E-02+I*(3.56063903979258E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16709889837464E-01+I*(4.42782031239137E-01):b := 3.65369984797010E-01+I*(3.43836184215671E-03):c := 3.31349078478586E-01+I*(7.59030538023731E-01):d := 5.55061105100409E-01+I*(-9.45769792586113E-01):e := 1.29858047639186E-02+I*(3.29666774052963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.15186930898828E-01+I*(7.18581297560023E-01):b := 1.24413992540838E-01+I*(2.61960187889069E-01):c := 6.31177438198541E-01+I*(7.46087915118817E-01):d := 5.35150175493896E-01+I*(-8.70791679090893E-01):e := 3.24039975089429E-03+I*(2.86261358572739E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.67905072130389E-01+I*(8.66555971108592E-01):b := -2.26343632979717E-01+I*(3.05115869855285E-01):c := 8.69178644691615E-01+I*(9.28899245423748E-01):d := 4.71702516159094E-01+I*(-8.26153610740742E-01):e := 1.81108894372138E-02+I*(2.55142451171644E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.56614686600614E-01+I*(8.17467057576157E-01):b := -5.22779500546802E-01+I*(1.12712384526831E-01):c := 9.33989288350923E-01+I*(1.22192507576723E+00):d := 3.94405992040947E-01+I*(-8.32742235813568E-01):e := 4.23765509053940E-02+I*(2.38854636010019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.46225337048929E-01+I*(5.94283805167050E-01):b := -6.26187973208085E-01+I*(-2.25222538984558E-01):c := 7.95283748718204E-01+I*(1.48805536351218E+00):d := 3.39428505829509E-01+I*(-8.87474663413383E-01):e := 7.03047618241417E-02+I*(2.35712911835020E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.48016092842918E-01+I*(3.01436138089050E-01):b := -4.88183077348192E-01+I*(-5.50565394239575E-01):c := 5.17963889327968E-01+I*(1.60276478931407E+00):d := 3.32494634329814E-01+I*(-9.64740982383056E-01):e := 9.89391756829117E-02+I*(2.47181753439430E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.61149039444540E-01+I*(7.59507344072414E-02):b := -1.73338837493541E-01+I*(-7.11084643481323E-01):c := 2.31790754455834E-01+I*(1.51237953798691E+00):d := 3.76848813077966E-01+I*(-1.02838742335720E+00):e := 1.20774627500965E-01+I*(2.78341671932446E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.73061347934861E-01+I*(2.33347204954633E-02):b := 1.71025627423914E-01+I*(-6.31671546016847E-01):c := 7.06679343685988E-02+I*(1.25919187314687E+00):d := 4.51737228895916E-01+I*(-1.04863310925260E+00):e := 1.14253301026209E-01+I*(3.27476452350872E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.45524588091325E-01+I*(-8.34542875911472E-02):b := 2.69741441682624E-01+I*(-3.75576251560212E-01):c := -9.45897768707628E-02+I*(9.90194261903671E-01):d := 6.15679109243192E-01+I*(-7.23791374881589E-01):e := 1.56975954090092E-01+I*(4.15266405986822E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.36820270194789E-02+I*(1.91120029623096E-01):b := 2.51333069395058E-01+I*(-2.26535169900095E-02):c := 1.26772714342063E-01+I*(7.87553682887351E-01):d := 6.48621454613188E-01+I*(-6.53556308834624E-01):e := 7.27657015151172E-02+I*(4.01520397986505E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.42159068080843E-01+I*(4.66919295943982E-01):b := 1.03770771388861E-02+I*(2.35868309056903E-01):c := 4.26601074062018E-01+I*(7.74611059982437E-01):d := 6.28710525006674E-01+I*(-5.78578195339404E-01):e := 4.25463534959102E-02+I*(3.42475686404722E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.94877209312404E-01+I*(6.14893969492551E-01):b := -3.40380548381669E-01+I*(2.79023991023119E-01):c := 6.64602280555092E-01+I*(9.57422390287369E-01):d := 5.65262865671873E-01+I*(-5.33940126989253E-01):e := 5.34266648647296E-02+I*(2.94978288616321E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.83586823782629E-01+I*(5.65805055960116E-01):b := -6.36816415948754E-01+I*(8.66205056946641E-02):c := 7.29412924214400E-01+I*(1.25044822063085E+00):d := 4.87966341553725E-01+I*(-5.40528752062079E-01):e := 8.03169076380401E-02+I*(2.66346284263739E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.73197474230944E-01+I*(3.42621803551009E-01):b := -7.40224888610036E-01+I*(-2.51314417816724E-01):c := 5.90707384581681E-01+I*(1.51657850837580E+00):d := 4.32988855342288E-01+I*(-5.95261179661894E-01):e := 1.14365269449769E-01+I*(2.53397840573251E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.74988230024933E-01+I*(4.97741364730090E-02):b := -6.02219992750143E-01+I*(-5.76657273071741E-01):c := 3.13387525191444E-01+I*(1.63128793417768E+00):d := 4.26054983842593E-01+I*(-6.72527498631567E-01):e := 1.53387422249248E-01+I*(2.56893012834057E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.88121176626555E-01+I*(-1.75711267208799E-01):b := -2.87375752895492E-01+I*(-7.37176522313489E-01):c := 2.72143903193113E-02+I*(1.54090268285053E+00):d := 4.70409162590745E-01+I*(-7.36173939605707E-01):e := 1.92964460230329E-01+I*(2.84915800958450E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.00033485116875E-01+I*(-2.28327281120578E-01):b := 5.69887120219620E-02+I*(-6.57763424849013E-01):c := -1.33908429767924E-01+I*(1.28771501801048E+00):d := 5.45297578408695E-01+I*(-7.56419625501113E-01):e := 2.09939105745617E-01+I*(3.48656684904895E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.21832168809535E-02+I*(-2.29297160092026E-01):b := 1.99155632755289E-01+I*(-4.68865306617373E-01):c := -2.69638687918660E-01+I*(8.80545106425045E-01):d := 4.99519288344928E-01+I*(-4.39803426024566E-01):e := 2.61596654978850E-01+I*(5.81706591128358E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74025777952800E-01+I*(4.52771571222177E-02):b := 1.80747260467723E-01+I*(-1.15942572047171E-01):c := -4.82761967058346E-02+I*(6.77904527408726E-01):d := 5.32461633714924E-01+I*(-3.69568359977601E-01):e := 9.18257597282255E-02+I*(5.61611581507175E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.55487368914356E-02+I*(3.21076423443104E-01):b := -6.02087317884493E-02+I*(1.42579253999742E-01):c := 2.51552163014120E-01+I*(6.64961904503812E-01):d := 5.12550704108411E-01+I*(-2.94590246482381E-01):e := 4.18065328204864E-02+I*(4.50995733289279E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.77169404340125E-01+I*(4.69051096991672E-01):b := -4.10966357309004E-01+I*(1.85734935965958E-01):c := 4.89553369507194E-01+I*(8.47773234808743E-01):d := 4.49103044773610E-01+I*(-2.49952178132230E-01):e := 6.31714405049055E-02+I*(3.73139534939122E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.65879018810350E-01+I*(4.19962183459238E-01):b := -7.07402224876089E-01+I*(-6.66854936249710E-03):c := 5.54364013166502E-01+I*(1.14079906515222E+00):d := 3.71806520655462E-01+I*(-2.56540803205056E-01):e := 1.04977828973010E-01+I*(3.28152731934779E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.55489669258665E-01+I*(1.96778931050130E-01):b := -8.10810697537371E-01+I*(-3.44603472873886E-01):c := 4.15658473533783E-01+I*(1.40692935289718E+00):d := 3.16829034444025E-01+I*(-3.11273230804870E-01):e := 1.55546952039823E-01+I*(3.05103951226886E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.57280425052654E-01+I*(-9.60687360278695E-02):b := -6.72805801677479E-01+I*(-6.69946328128903E-01):c := 1.38338614143547E-01+I*(1.52163877869906E+00):d := 3.09895162944330E-01+I*(-3.88539549774544E-01):e := 2.15447860934919E-01+I*(3.02808023146230E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70413371654276E-01+I*(-3.21554139709678E-01):b := -3.57961561822828E-01+I*(-8.30465577370651E-01):c := -1.47834520728587E-01+I*(1.43125352737190E+00):d := 3.54249341692481E-01+I*(-4.52185990748684E-01):e := 2.85603143084683E-01+I*(3.34527305539456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.82325680144597E-01+I*(-3.74170153621457E-01):b := -1.35970969053734E-02+I*(-7.51052479906175E-01):c := -3.08957340815822E-01+I*(1.17806586253186E+00):d := 4.29137757510431E-01+I*(-4.72431676644090E-01):e := 3.39662886611635E-01+I*(4.35344177281993E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.32703062508256E-01+I*(-2.01079402571599E-01):b := 2.05048814773555E-01+I*(-5.85700552245925E-01):c := -3.33252814946677E-01+I*(6.84029709067246E-01):d := 2.27991768206529E-01+I*(-2.96922129506699E-01):e := 8.78019078484328E-02+I*(9.82411394164156E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.34545623580102E-01+I*(7.34949146426444E-02):b := 1.86640442485989E-01+I*(-2.32777817675722E-01):c := -1.11890323733851E-01+I*(4.81389130050926E-01):d := 2.60934113576525E-01+I*(-2.26687063459733E-01):e := -1.49612724231063E-01+I*(7.30290412752998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36068582518738E-01+I*(3.49294180963530E-01):b := -5.43155497701836E-02+I*(2.57440083711905E-02):c := 1.87938035986104E-01+I*(4.68446507146012E-01):d := 2.41023183970012E-01+I*(-1.51708949964513E-01):e := -1.06258899805870E-01+I*(5.41463523669928E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.33504412871770E-02+I*(4.97268854512099E-01):b := -4.05073175290738E-01+I*(6.88996903374060E-02):c := 4.25939242479177E-01+I*(6.51257837450944E-01):d := 1.77575524635211E-01+I*(-1.07070881614363E-01):e := -2.33336091339667E-02+I*(4.56425891046012E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.05359173183048E-01+I*(4.48179940979664E-01):b := -7.01509042857823E-01+I*(-1.23503794991049E-01):c := 4.90749886138485E-01+I*(9.44283667794420E-01):d := 1.00279000517063E-01+I*(-1.13659506687188E-01):e := 5.91465079409038E-02+I*(4.18185969449534E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.94969823631363E-01+I*(2.24996688570557E-01):b := -8.04917515519106E-01+I*(-4.61438718502437E-01):c := 3.52044346505766E-01+I*(1.21041395553938E+00):d := 4.53015143056258E-02+I*(-1.68391934287003E-01):e := 1.44395526367371E-01+I*(4.07229449231376E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.96760579425352E-01+I*(-6.78509785074427E-02):b := -6.66912619659213E-01+I*(-7.86781573757454E-01):c := 7.47244871155307E-02+I*(1.32512338134126E+00):d := 3.83676428059303E-02+I*(-2.45658253256676E-01):e := 2.42346900247410E-01+I*(4.26480928338013E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.09893526026974E-01+I*(-2.93336382189251E-01):b := -3.52068379804562E-01+I*(-9.47300822999202E-01):c := -2.11448647756603E-01+I*(1.23473813001410E+00):d := 8.27218215540821E-02+I*(-3.09304694230816E-01):e := 3.59851225713473E-01+I*(5.10118418384412E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.81941654827056E-02+I*(-3.45952396101030E-01):b := -7.70391488710754E-03+I*(-8.67887725534726E-01):c := -3.72571467843839E-01+I*(9.81550465174060E-01):d := 1.57610237372032E-01+I*(-3.29550380126222E-01):e := 4.21793601022664E-01+I*(7.57375420278559E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.75546479432753E-01+I*(-5.38264252372469E-02):b := 2.96719917685493E-01+I*(-4.10656499034430E-01):c := -6.54159562099313E-01+I*(2.53399056226137E-01):d := 1.05506703250610E-01+I*(-2.14585194835861E-01):e := 4.10179570963074E-01+I*(1.11034533333798E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.77389040504599E-01+I*(2.20747891976996E-01):b := 2.78311545397927E-01+I*(-5.77337644642277E-02):c := -4.32797070886488E-01+I*(5.07584772098166E-02):d := 1.38449048620606E-01+I*(-1.44350128788896E-01):e := -5.52663410603612E-02+I*(9.08382510730904E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.78911999443236E-01+I*(4.96547158297882E-01):b := 3.73555531417543E-02+I*(2.00788061582685E-01):c := -1.32968711166533E-01+I*(3.78158543049026E-02):d := 1.18538119014093E-01+I*(-6.93720152936757E-02):e := -5.95943096799194E-02+I*(6.35024417723731E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26193858211675E-01+I*(6.44521831846451E-01):b := -3.13402072378801E-01+I*(2.43943743548901E-01):c := 1.05032495326541E-01+I*(2.20627184609834E-01):d := 5.50904596792914E-02+I*(-2.47339469435257E-02):e := 2.33939460550265E-02+I*(5.07086702345657E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.25157562585502E-02+I*(5.95432918314017E-01):b := -6.09837939945885E-01+I*(5.15402582204459E-02):c := 1.69843138985849E-01+I*(5.13653014953311E-01):d := -2.22060644388565E-02+I*(-3.13225720163512E-02):e := 1.11047865490631E-01+I*(4.42258160436148E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.52126406706866E-01+I*(3.72249665904909E-01):b := -7.13246412607167E-01+I*(-2.86394665290943E-01):c := 3.11375993531295E-02+I*(7.79783302698268E-01):d := -7.71835506502935E-02+I*(-8.60549996161657E-02):e := 2.02912275416670E-01+I*(4.08332608576409E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.53917162500855E-01+I*(7.94019988269094E-02):b := -5.75241516747275E-01+I*(-6.11737520545960E-01):c := -2.46182260037106E-01+I*(8.94492728500150E-01):d := -8.41174221499888E-02+I*(-1.63321318585840E-01):e := 3.11646067945653E-01+I*(4.00627768447835E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.70501091024764E-02+I*(-1.46083404854899E-01):b := -2.60397276892624E-01+I*(-7.72256769787707E-01):c := -5.32355394909240E-01+I*(8.04107477172994E-01):d := -3.97632434018368E-02+I*(-2.26967759559980E-01):e := 4.57827382688370E-01+I*(4.43887736735466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21037582407203E-01+I*(-1.98699418766678E-01):b := 8.39671880248305E-02+I*(-6.92843672323232E-01):c := -6.93478214996476E-01+I*(5.50919812332951E-01):d := 3.51251724161136E-02+I*(-2.47213445455385E-01):e := 6.32204631255760E-01+I*(6.54280856660695E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.92996209493269E-01+I*(2.07635500721333E-01):b := 4.12803513723707E-01+I*(-4.25141075183596E-01):c := -4.71676152427366E-01+I*(1.56626830093168E-01):d := -8.23541643790752E-02+I*(-4.57176525061319E-01):e := -1.31904554334278E-01+I*(7.68554860587377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.94838770565116E-01+I*(4.82209817935576E-01):b := 3.94395141436141E-01+I*(-7.22183406133935E-02):c := -2.50313661214540E-01+I*(-4.60137489231521E-02):d := -4.94118190090791E-02+I*(-3.86941459014354E-01):e := -2.06476838749972E-01+I*(5.61767874105413E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.96361729503752E-01+I*(7.58009084256462E-01):b := 1.53439149179969E-01+I*(1.86303485433519E-01):c := 4.95146985054151E-02+I*(-5.89563718280663E-02):d := -6.93227486155927E-02+I*(-3.11963345519133E-01):e := -1.43853622660416E-01+I*(4.45577774550762E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43643588272191E-01+I*(9.05983757805031E-01):b := -1.97318476340586E-01+I*(2.29459167399735E-01):c := 2.87515904998489E-01+I*(1.23854958476865E-01):d := -1.32770407950394E-01+I*(-2.67325277168983E-01):e := -6.83825907341386E-02+I*(3.98210416377803E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.50660261980338E-02+I*(8.56894844272597E-01):b := -4.93754343907671E-01+I*(3.70556820712799E-02):c := 3.52326548657797E-01+I*(4.16880788820342E-01):d := -2.10066932068542E-01+I*(-2.73913902241809E-01):e := 3.61424480482678E-03+I*(3.84809407012504E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.34676676646349E-01+I*(6.33711591863489E-01):b := -5.97162816568953E-01+I*(-3.00879241440108E-01):c := 2.13621009025078E-01+I*(6.83011076565299E-01):d := -2.65044418279980E-01+I*(-3.28646329841623E-01):e := 7.58349929965980E-02+I*(3.96084221011009E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.36467432440338E-01+I*(3.40863924785490E-01):b := -4.59157920709060E-01+I*(-6.26222096695126E-01):c := -6.36988503651580E-02+I*(7.97720502367181E-01):d := -2.71978289779675E-01+I*(-4.05912648811298E-01):e := 1.52282735421105E-01+I*(4.40855281289570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.96003790419602E-02+I*(1.15378521103681E-01):b := -1.44313680854409E-01+I*(-7.86741345936873E-01):c := -3.49871985237292E-01+I*(7.07335251040025E-01):d := -2.27624111031523E-01+I*(-4.69559089785438E-01):e := 2.18295465281860E-01+I*(5.53722395205984E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.38487312467719E-01+I*(6.27625071919027E-02):b := 2.00050784063045E-01+I*(-7.07328248472398E-01):c := -5.10994805324527E-01+I*(4.54147586199982E-01):d := -1.52735695213572E-01+I*(-4.89804775680844E-01):e := 1.53348617332586E-01+I*(7.61605522028923E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.38298991829099E-01+I*(4.19143426464364E-01):b := 5.11039213486295E-01+I*(-3.61619807032376E-01):c := -2.69681762566709E-01+I*(1.99793078726235E-01):d := -7.03292368200063E-02+I*(-7.63766903586698E-01):e := -7.79197673552581E-02+I*(4.99975667611769E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.40141552900946E-01+I*(6.93717743678607E-01):b := 4.92630841198729E-01+I*(-8.69707246217395E-03):c := -4.83192713538838E-02+I*(-2.84750029008517E-03):d := -3.73868914500101E-02+I*(-6.93531837539732E-01):e := -1.19935180513950E-01+I*(4.07793109506260E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41664511839582E-01+I*(9.69517009999493E-01):b := 2.51674848942556E-01+I*(2.49824753584739E-01):c := 2.51509088366071E-01+I*(-1.57901231949993E-02):d := -5.72978210565236E-02+I*(-6.18553724044511E-01):e := -9.34386119851723E-02+I*(3.41954009794290E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.89463706080209E-02+I*(1.11749168354806E+00):b := -9.90827765779990E-02+I*(2.92980435550954E-01):c := 4.89510294859145E-01+I*(1.67021207109932E-01):d := -1.20745480391325E-01+I*(-5.73915655694361E-01):e := -5.04214237011493E-02+I*(3.11526305509925E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.99763243862204E-01+I*(1.06840277001563E+00):b := -3.95518644145084E-01+I*(1.00576950222499E-01):c := 5.54320938518453E-01+I*(4.60047037453409E-01):d := -1.98042004509473E-01+I*(-5.80504280767187E-01):e := -5.82724718191395E-03+I*(3.04097096522041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.89373894310519E-01+I*(8.45219517606520E-01):b := -4.98927116806366E-01+I*(-2.37357973288889E-01):c := 4.15615398885734E-01+I*(7.26177325198367E-01):d := -2.53019490720910E-01+I*(-6.35236708367001E-01):e := 3.82563381679110E-02+I*(3.15442826823820E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91164650104508E-01+I*(5.52371850528520E-01):b := -3.60922220946473E-01+I*(-5.62700828543906E-01):c := 1.38295539495498E-01+I*(8.40886751000248E-01):d := -2.59953362220605E-01+I*(-7.12503027336675E-01):e := 7.90673643673068E-02+I*(3.50448104129074E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.04297596706130E-01+I*(3.26886446846712E-01):b := -4.60779810918220E-02+I*(-7.23220077785654E-01):c := -1.47877595376636E-01+I*(7.50501499673092E-01):d := -2.15599183472454E-01+I*(-7.76149468310816E-01):e := 9.88380353185336E-02+I*(4.20880409043688E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.37900948035491E-02+I*(2.74270432934933E-01):b := 2.98286483825632E-01+I*(-6.43806980321178E-01):c := -3.09000415463871E-01+I*(4.97313834833048E-01):d := -1.40710767654503E-01+I*(-7.96395154206221E-01):e := 4.34884885544368E-02+I*(5.08942910230807E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.38393738533741E-02+I*(4.81730442887924E-01):b := 5.45461441286149E-01+I*(-2.49815001908986E-01):c := -1.42691812450729E-01+I*(3.62699834650510E-01):d := 1.35954888680746E-01+I*(-9.90899284927459E-01):e := 1.10978386242595E-02+I*(3.93936710334794E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.85681934925221E-01+I*(7.56304760102168E-01):b := 5.27053068998583E-01+I*(1.03107732661216E-01):c := 7.86706787620964E-02+I*(1.60059255634190E-01):d := 1.68897234050742E-01+I*(-9.20664218880494E-01):e := -3.53273557629636E-02+I*(3.48432872215395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.72048938638564E-02+I*(1.03210402642305E+00):b := 2.86097076742410E-01+I*(3.61629558708129E-01):c := 3.78499038482051E-01+I*(1.47116632729276E-01):d := 1.48986304444229E-01+I*(-8.45686105385273E-01):e := -3.32593349367048E-02+I*(2.98871810833772E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.65513247367704E-01+I*(1.18007869997162E+00):b := -6.46605487781448E-02+I*(4.04785240674345E-01):c := 6.16500244975125E-01+I*(3.29927963034208E-01):d := 8.55386451094272E-02+I*(-8.01048037035123E-01):e := -9.46080341779471E-03+I*(2.69074527377734E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54222861837929E-01+I*(1.13098978643919E+00):b := -3.61096416345229E-01+I*(2.12381755345890E-01):c := 6.81310888634433E-01+I*(6.22953793377684E-01):d := 8.24212099127909E-03+I*(-8.07636662107949E-01):e := 2.07380669730382E-02+I*(2.56654724333588E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.43833512286244E-01+I*(9.07806534030080E-01):b := -4.64504889006511E-01+I*(-1.25553168165499E-01):c := 5.42605349001714E-01+I*(8.89084081122641E-01):d := -4.67353652201582E-02+I*(-8.62369089707763E-01):e := 5.27052078066839E-02+I*(2.58961012879791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.45624268080234E-01+I*(6.14958866952080E-01):b := -3.26499993146618E-01+I*(-4.50896023420516E-01):c := 2.65285489611478E-01+I*(1.00379350692452E+00):d := -5.36692367198533E-02+I*(-9.39635408677437E-01):e := 8.33326206455460E-02+I*(2.78149734788641E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.58757214681855E-01+I*(3.89473463270272E-01):b := -1.16557532919676E-02+I*(-6.11415272662263E-01):c := -2.08876452606559E-02+I*(9.13408255597367E-01):d := -9.31505797170133E-03+I*(-1.00328184965158E+00):e := 1.02110473352127E-01+I*(3.20086730575681E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.70669523172176E-01+I*(3.36857449358494E-01):b := 3.32708711625487E-01+I*(-5.32002175197788E-01):c := -1.82010465347891E-01+I*(6.60220590757324E-01):d := 6.55733578462490E-02+I*(-1.02352753554698E+00):e := 8.07521735248059E-02+I*(3.77285363634466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.51318161179420E-01+I*(3.66111389430222E-01):b := 4.99963654175270E-01+I*(-1.42041370702659E-01):c := -1.50126311074780E-01+I*(5.69121216262104E-01):d := 4.39975577208695E-01+I*(-1.03229590355902E+00):e := 9.11504261959792E-02+I*(3.40261525706220E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.94756001075740E-02+I*(6.40685706644465E-01):b := 4.81555281887703E-01+I*(2.10881363867544E-01):c := 7.12361801380456E-02+I*(3.66480637245784E-01):d := 4.72917922578691E-01+I*(-9.62060837512058E-01):e := 3.98117197254088E-02+I*(3.23347999509637E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.47952641168938E-01+I*(9.16484972965351E-01):b := 2.40599289631531E-01+I*(4.69403189914456E-01):c := 3.71064539858000E-01+I*(3.53538014340870E-01):d := 4.53006992972178E-01+I*(-8.87082724016838E-01):e := 2.37938469661832E-02+I*(2.82845298442493E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.00670782400498E-01+I*(1.06445964651392E+00):b := -1.10158335889024E-01+I*(5.12558871880672E-01):c := 6.09065746351075E-01+I*(5.36349344645802E-01):d := 3.89559333637376E-01+I*(-8.42444655666688E-01):e := 3.40744169088681E-02+I*(2.50630707552787E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.89380396870723E-01+I*(1.01537073298149E+00):b := -4.06594203456109E-01+I*(3.20155386552217E-01):c := 6.73876390010383E-01+I*(8.29375174989278E-01):d := 3.12262809519228E-01+I*(-8.49033280739513E-01):e := 5.55380964735137E-02+I*(2.32002490264475E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.78991047319039E-01+I*(7.92187480572378E-01):b := -5.10002676117391E-01+I*(-1.77795369591715E-02):c := 5.35170850377663E-01+I*(1.09550546273424E+00):d := 2.57285323307790E-01+I*(-9.03765708339328E-01):e := 8.18259970421004E-02+I*(2.25872463661585E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.80781803113028E-01+I*(4.99339813494378E-01):b := -3.71997780257498E-01+I*(-3.43122392214189E-01):c := 2.57850990987427E-01+I*(1.21021488853612E+00):d := 2.50351451808095E-01+I*(-9.81032027309002E-01):e := 1.10022134759034E-01+I*(2.33483291151557E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.93914749714650E-01+I*(2.73854409812570E-01):b := -5.71535404028471E-02+I*(-5.03641641455936E-01):c := -2.83221438847064E-02+I*(1.11982963720896E+00):d := 2.94705630556247E-01+I*(-1.04467846828314E+00):e := 1.33911918349953E-01+I*(2.59783236219075E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.05827058204971E-01+I*(2.21238395900791E-01):b := 2.87210924514607E-01+I*(-4.24228543991461E-01):c := -1.89444963971942E-01+I*(8.66641972368918E-01):d := 3.69594046374198E-01+I*(-1.06492415417855E+00):e := 1.34528482899969E-01+I*(3.05763569190733E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.57140789142553E-01+I*(1.26385706166765E-01):b := 3.95834772394416E-01+I*(-8.87273932253270E-02):c := -2.88506573907419E-01+I*(7.22470364986837E-01):d := 6.99478169788025E-01+I*(-8.68586821551513E-01):e := 1.71674976778980E-01+I*(3.08876640749034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.55298228070706E-01+I*(4.00960023381008E-01):b := 3.77426400106850E-01+I*(2.64195341344875E-01):c := -6.71440826945935E-02+I*(5.19829785970517E-01):d := 7.32420515158021E-01+I*(-7.98351755504548E-01):e := 1.16073533229840E-01+I*(3.17576323800761E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.53775269132070E-01+I*(6.76759289701894E-01):b := 1.36470407850678E-01+I*(5.22717167391788E-01):c := 2.32684277025361E-01+I*(5.06887163065603E-01):d := 7.12509585551507E-01+I*(-7.23373642009328E-01):e := 8.21663229289915E-02+I*(2.84744667435706E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.06493410363631E-01+I*(8.24733963250463E-01):b := -2.14287217669877E-01+I*(5.65872849358004E-01):c := 4.70685483518436E-01+I*(6.89698493370535E-01):d := 6.49061926216706E-01+I*(-6.78735573659178E-01):e := 7.98387910899996E-02+I*(2.48398930300199E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.95203024833857E-01+I*(7.75645049718028E-01):b := -5.10723085236962E-01+I*(3.73469364029549E-01):c := 5.35496127177744E-01+I*(9.82724323714012E-01):d := 5.71765402098558E-01+I*(-6.85324198732003E-01):e := 9.44384343076638E-02+I*(2.22526772159085E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.84813675282171E-01+I*(5.52461797308921E-01):b := -6.14131557898244E-01+I*(3.55344405181605E-02):c := 3.96790587545024E-01+I*(1.24885461145897E+00):d := 5.16787915887121E-01+I*(-7.40056626331818E-01):e := 1.17456923437824E-01+I*(2.08033978544294E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.86604431076161E-01+I*(2.59614130230921E-01):b := -4.76126662038351E-01+I*(-2.89808414736857E-01):c := 1.19470728154788E-01+I*(1.36356403726085E+00):d := 5.09854044387426E-01+I*(-8.17322945301492E-01):e := 1.45745982339140E-01+I*(2.05805435174711E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.99737377677782E-01+I*(3.41287265491120E-02):b := -1.61282422183700E-01+I*(-4.50327663978604E-01):c := -1.66702406717346E-01+I*(1.27317878593369E+00):d := 5.54208223135578E-01+I*(-8.80969386275632E-01):e := 1.75760575989618E-01+I*(2.20713721090417E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.11649686168103E-01+I*(-1.84872873626661E-02):b := 1.83082042733754E-01+I*(-3.70914566514129E-01):c := -3.27825226804581E-01+I*(1.01999112109365E+00):d := 6.29096638953528E-01+I*(-9.01215072171037E-01):e := 1.93992058688407E-01+I*(2.59748467064282E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84112926324567E-01+I*(-1.25276295449277E-01):b := 2.81797856992465E-01+I*(-1.14819272057493E-01):c := -4.93082938043943E-01+I*(7.50993509850457E-01):d := 7.93038519300804E-01+I*(-5.76373337800024E-01):e := 2.68235797043315E-01+I*(2.94176048825479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.22703652527208E-02+I*(1.49298021764967E-01):b := 2.63389484704899E-01+I*(2.38103462512709E-01):c := -2.71720446831117E-01+I*(5.48352930834137E-01):d := 8.25980864670799E-01+I*(-5.06138271753059E-01):e := 2.06843767337728E-01+I*(3.35248323196428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.80747406314085E-01+I*(4.25097288085853E-01):b := 2.24334924487262E-02+I*(4.96625288559622E-01):c := 2.81079128888380E-02+I*(5.35410307929223E-01):d := 8.06069935064286E-01+I*(-4.31160158257838E-01):e := 1.48145763083967E-01+I*(3.10268760311283E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.33465547545646E-01+I*(5.73071961634421E-01):b := -3.28324133071829E-01+I*(5.39780970525837E-01):c := 2.66109119381912E-01+I*(7.18221638234154E-01):d := 7.42622275729484E-01+I*(-3.86522089907688E-01):e := 1.30611422868918E-01+I*(2.65652306313773E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.22175162015870E-01+I*(5.23983048101987E-01):b := -6.24760000638913E-01+I*(3.47377485197382E-01):c := 3.30919763041220E-01+I*(1.01124746857763E+00):d := 6.65325751611336E-01+I*(-3.93110714980514E-01):e := 1.38922355239564E-01+I*(2.29217419570374E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.11785812464186E-01+I*(3.00799795692879E-01):b := -7.28168473300195E-01+I*(9.44256168599417E-03):c := 1.92214223408501E-01+I*(1.27737775632259E+00):d := 6.10348265399899E-01+I*(-4.47843142580328E-01):e := 1.60405124677351E-01+I*(2.04427011431839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.13576568258175E-01+I*(7.95212861487971E-03):b := -5.90163577440303E-01+I*(-3.15900293569023E-01):c := -8.51056359817352E-02+I*(1.39208718212447E+00):d := 6.03414393900204E-01+I*(-5.25109461550002E-01):e := 1.90931748072126E-01+I*(1.91615287999475E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.26709514859797E-01+I*(-2.17533275066929E-01):b := -2.75319337585652E-01+I*(-4.76419542810771E-01):c := -3.71278770853869E-01+I*(1.30170193079731E+00):d := 6.47768572648356E-01+I*(-5.88755902524142E-01):e := 2.29106807437698E-01+I*(1.95512370030186E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.38621823350118E-01+I*(-2.70149288978707E-01):b := 6.90451273318024E-02+I*(-3.97006445346295E-01):c := -5.32401590941105E-01+I*(1.04851426595727E+00):d := 7.22656988466307E-01+I*(-6.09001588419548E-01):e := 2.66498516222899E-01+I*(2.28388278039897E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.35948786477110E-02+I*(-2.71119167950155E-01):b := 2.11212048065130E-01+I*(-2.08108327114655E-01):c := -6.68131849091840E-01+I*(6.41344354371831E-01):d := 6.76878698402540E-01+I*(-2.92385388943002E-01):e := 4.09463120677496E-01+I*(3.13683315226350E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.35437439719557E-01+I*(3.45514926408836E-03):b := 1.92803675777564E-01+I*(1.44814407455548E-01):c := -4.46769357879014E-01+I*(4.38703775355511E-01):d := 7.09821043772536E-01+I*(-2.22150322896036E-01):e := 3.28416341822099E-01+I*(4.13006677248551E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69603986581935E-02+I*(2.79254415584974E-01):b := -4.81523164786090E-02+I*(4.03336233502460E-01):c := -1.46940998159059E-01+I*(4.25761152450597E-01):d := 6.89910114166023E-01+I*(-1.47172209400815E-01):e := 2.19849006741473E-01+I*(3.89323798805929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.15757742573367E-01+I*(4.27229089133543E-01):b := -3.98909941999164E-01+I*(4.46491915468676E-01):c := 9.10602083340145E-02+I*(6.08572482755529E-01):d := 6.26462454831221E-01+I*(-1.02534141050666E-01):e := 1.82385162669885E-01+I*(3.21162972560340E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04467357043592E-01+I*(3.78140175601109E-01):b := -6.95345809566249E-01+I*(2.54088430140221E-01):c := 1.55870851993323E-01+I*(9.01598313099006E-01):d := 5.49165930713073E-01+I*(-1.09122766123491E-01):e := 1.87649638973067E-01+I*(2.64932411831019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.94078007491907E-01+I*(1.54956923192001E-01):b := -7.98754282227531E-01+I*(-8.38464933711674E-02):c := 1.71653123606034E-02+I*(1.16772860084396E+00):d := 4.94188444501636E-01+I*(-1.63855193723306E-01):e := 2.12383160266352E-01+I*(2.24646340585511E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.95868763285897E-01+I*(-1.37890743885998E-01):b := -6.60749386367637E-01+I*(-4.09189348626184E-01):c := -2.60154547029633E-01+I*(1.28243802664584E+00):d := 4.87254573001941E-01+I*(-2.41121512692980E-01):e := 2.50568172750709E-01+I*(1.98093731324838E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.09001709887518E-01+I*(-3.63376147567807E-01):b := -3.45905146512987E-01+I*(-5.69708597867932E-01):c := -5.46327681901766E-01+I*(1.19205277531869E+00):d := 5.31608751750093E-01+I*(-3.04767953667120E-01):e := 3.03657927709861E-01+I*(1.89216413940289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.20914018377839E-01+I*(-4.15992161479585E-01):b := -1.54068159553288E-03+I*(-4.90295500403456E-01):c := -7.07450501989002E-01+I*(9.38865110478646E-01):d := 6.06497167568043E-01+I*(-3.25013639562526E-01):e := 3.70485561391158E-01+I*(2.16937096991757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.94114724275013E-01+I*(-2.42901410429728E-01):b := 2.17105230083395E-01+I*(-3.24943572743206E-01):c := -7.31745976119857E-01+I*(4.44828957014032E-01):d := 4.05351178264141E-01+I*(-1.49504092425134E-01):e := 6.36837303378718E-01+I*(4.90074336277748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95957285346860E-01+I*(3.16729067845149E-02):b := 1.98696857795829E-01+I*(2.79791618269963E-02):c := -5.10383484907031E-01+I*(2.42188377997712E-01):d := 4.38293523634137E-01+I*(-7.92690263781685E-02):e := 4.11425585582381E-01+I*(6.97984975497293E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.97480244285496E-01+I*(3.07472173105401E-01):b := -4.22591344603432E-02+I*(2.86500987873909E-01):c := -2.10555125187076E-01+I*(2.29245755092798E-01):d := 4.18382594027624E-01+I*(-4.29091288294807E-03):e := 2.07792113305784E-01+I*(5.80271296567134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.47621030539351E-02+I*(4.55446846653970E-01):b := -3.93016759980898E-01+I*(3.29656669840125E-01):c := 2.74460813059978E-02+I*(4.12057085397729E-01):d := 3.54934934692822E-01+I*(4.03471554672019E-02):e := 1.80011826225177E-01+I*(4.43991227533921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.43947511416290E-01+I*(4.06357933121535E-01):b := -6.89452627547983E-01+I*(1.37253184511670E-01):c := 9.22567249653060E-02+I*(7.05082915741206E-01):d := 2.77638410574674E-01+I*(3.37585303943765E-02):e := 2.08427773972445E-01+I*(3.55457132642459E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.33558161864605E-01+I*(1.83174680712427E-01):b := -7.92861100209265E-01+I*(-2.00681738999719E-01):c := -4.64488146674140E-02+I*(9.71213203486163E-01):d := 2.22660924363237E-01+I*(-2.09738972054380E-02):e := 2.56295624457889E-01+I*(2.96369397797691E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.35348917658594E-01+I*(-1.09672986365572E-01):b := -6.54856204349372E-01+I*(-5.26024594254736E-01):c := -3.23768674057650E-01+I*(1.08592262928805E+00):d := 2.15727052863542E-01+I*(-9.82402161751121E-02):e := 3.20553382399322E-01+I*(2.56277725165832E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.48481864260216E-01+I*(-3.35158390047381E-01):b := -3.40011964494721E-01+I*(-6.86543843496483E-01):c := -6.09941808929783E-01+I*(9.95537377960889E-01):d := 2.60081231611694E-01+I*(-1.61886657149252E-01):e := 4.10733346798892E-01+I*(2.38867002275299E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.96058272494631E-02+I*(-3.87774403959159E-01):b := 4.35250042273299E-03+I*(-6.07130746032008E-01):c := -7.71064629017019E-01+I*(7.42349713120846E-01):d := 3.34969647429644E-01+I*(-1.82132343044658E-01):e := 5.40439332267058E-01+I*(2.80706666340659E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.72868765823401E-01+I*(-1.10668047651766E-01):b := 1.38344312073896E-01+I*(-2.03155349503483E-01):c := -8.05667754189435E-01+I*(-1.85985817221050E-01):d := 1.46613406079763E-01+I*(1.23480045323257E-02):e := 1.22166293910377E+00+I*(3.63856225681711E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.74711326895247E-01+I*(1.63906269562477E-01):b := 1.19935939786330E-01+I*(1.49767385066720E-01):c := -5.84305262976609E-01+I*(-3.88626396237370E-01):d := 1.79555751449759E-01+I*(8.25830705792910E-02):e := 1.44082280390352E+00+I*(1.03321663003168E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.76234285833883E-01+I*(4.39705535883363E-01):b := -1.21020052469842E-01+I*(4.08289211113633E-01):c := -2.84476903256655E-01+I*(-4.01569019142284E-01):d := 1.59644821843246E-01+I*(1.57561184074511E-01):e := 4.90405374431804E-01+I*(1.02706562240111E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.23516144602323E-01+I*(5.87680209431931E-01):b := -4.71777677990397E-01+I*(4.51444893079848E-01):c := -4.64756967635809E-02+I*(-2.18757688837352E-01):d := 9.61971625084445E-02+I*(2.02199252424662E-01):e := 3.38632607632791E-01+I*(6.59680069573731E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.51934698679023E-02+I*(5.38591295899497E-01):b := -7.68213545557482E-01+I*(2.59041407751394E-01):c := 1.83349468957270E-02+I*(7.42681415061242E-02):d := 1.89006383902966E-02+I*(1.95610627351836E-01):e := 3.56806737565330E-01+I*(4.57784597686120E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.54804120316217E-01+I*(3.15408043490389E-01):b := -8.71622018218764E-01+I*(-7.88935157599946E-02):c := -1.20370592736992E-01+I*(3.40398429251081E-01):d := -3.60768478211405E-02+I*(1.40878199752022E-01):e := 4.07530395879252E-01+I*(3.24679296551768E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.56594876110207E-01+I*(2.25603764123900E-02):b := -7.33617122358872E-01+I*(-4.04236371015012E-01):c := -3.97690452127228E-01+I*(4.55107855052963E-01):d := -4.30107193208359E-02+I*(6.36118807823479E-02):e := 4.78066064092108E-01+I*(2.16870624747238E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.97278227118284E-02+I*(-2.02925027269419E-01):b := -4.18772882504221E-01+I*(-5.64755620256760E-01):c := -6.83863586999361E-01+I*(3.64722603725807E-01):d := 1.34345942731575E-03+I*(-3.45601917921099E-05):e := 5.83317776396295E-01+I*(1.14291839335965E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.18359868797851E-01+I*(-2.55541041181197E-01):b := -7.44084175867663E-02+I*(-4.85342522792285E-01):c := -8.44986407086597E-01+I*(1.11534938885764E-01):d := 7.62318752452662E-02+I*(-2.02802460871981E-02):e := 7.75667454423815E-01+I*(1.34224400746726E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.90318495883917E-01+I*(1.50793878306814E-01):b := 2.54427908112111E-01+I*(-2.17639925652649E-01):c := -6.23184344517487E-01+I*(-2.82758043354019E-01):d := -4.12474615499227E-02+I*(-2.30243325693132E-01):e := 9.04277720375434E-01+I*(1.45490613833824E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.92161056955764E-01+I*(4.25368195521057E-01):b := 2.36019535824545E-01+I*(1.35282808917554E-01):c := -4.01821853304662E-01+I*(-4.85398622370338E-01):d := -8.30511617992662E-03+I*(-1.60008259646167E-01):e := -7.98420308885840E-02+I*(1.24468569597893E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.93684015894400E-01+I*(7.01167461841943E-01):b := -4.93645643162765E-03+I*(3.93804634964467E-01):c := -1.01993493584707E-01+I*(-4.98341245275252E-01):d := -2.82160457864399E-02+I*(-8.50301461509462E-02):e := -8.11344020460512E-02+I*(7.82526600048142E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.40965874662839E-01+I*(8.49142135390511E-01):b := -3.55694081952183E-01+I*(4.36960316930682E-01):c := 1.36007712908367E-01+I*(-3.15529914970321E-01):d := -9.16637051212413E-02+I*(-4.03920778007962E-02):e := 3.78689873301839E-02+I*(5.95971021978798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.77437398073857E-02+I*(8.00053221858077E-01):b := -6.52129949519267E-01+I*(2.44556831602228E-01):c := 2.00818356567675E-01+I*(-2.25040846268446E-02):d := -1.68960229239389E-01+I*(-4.69807028736215E-02):e := 1.50457228540520E-01+I*(5.01176737452380E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.37354390255701E-01+I*(5.76869969448970E-01):b := -7.55538422180549E-01+I*(-9.33780919091605E-02):c := 6.21128169349559E-02+I*(2.43626203118112E-01):d := -2.23937715450826E-01+I*(-1.01713130473436E-01):e := 2.63467628745975E-01+I*(4.43108868498222E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.39145146049690E-01+I*(2.84022302370970E-01):b := -6.17533526320657E-01+I*(-4.18720947164178E-01):c := -2.15207042455280E-01+I*(3.58335628919994E-01):d := -2.30871586950522E-01+I*(-1.78979449443110E-01):e := 3.97186623738589E-01+I*(4.07986693418059E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.22780926513122E-02+I*(5.85368986891611E-02):b := -3.02689286466006E-01+I*(-5.79240196405926E-01):c := -5.01380177327413E-01+I*(2.67950377592838E-01):d := -1.86517408202370E-01+I*(-2.42625890417250E-01):e := 5.89987645616567E-01+I*(4.10935984651665E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35809598858367E-01+I*(5.92088477738265E-03):b := 4.16751784514481E-02+I*(-4.99827098941450E-01):c := -6.62502997414649E-01+I*(1.47627127527953E-02):d := -1.11628992384420E-01+I*(-2.62871576312656E-01):e := 9.15722766892175E-01+I*(5.80286429329713E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.35621278219747E-01+I*(3.62301804049844E-01):b := 3.52663607874698E-01+I*(-1.54118657501429E-01):c := -4.21189954656831E-01+I*(-2.39591794720951E-01):d := -2.92225339908534E-02+I*(-5.36833704218510E-01):e := 1.52048722308379E-01+I*(8.15862168673211E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.37463839291594E-01+I*(6.36876121264087E-01):b := 3.34255235587132E-01+I*(1.98804077068773E-01):c := -1.99827463444006E-01+I*(-4.42232373737271E-01):d := 3.71981137914289E-03+I*(-4.66598638171545E-01):e := -6.20398964934811E-02+I*(6.65865508512128E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.38986798230230E-01+I*(9.12675387584973E-01):b := 9.32992433309597E-02+I*(4.57325903115686E-01):c := 1.00000896275949E-01+I*(-4.55174996642185E-01):d := -1.61911182273705E-02+I*(-3.91620524676324E-01):e := -5.65693568493908E-02+I*(5.05684410741156E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.62686569986687E-02+I*(1.06065006113354E+00):b := -2.57458382189595E-01+I*(5.00481585081902E-01):c := 3.38002102769023E-01+I*(-2.72363666337254E-01):d := -7.96387775621721E-02+I*(-3.46982456326174E-01):e := 3.37421514017243E-03+I*(4.23712194042626E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.02440957471556E-01+I*(1.01156114760111E+00):b := -5.53894249756680E-01+I*(3.08078099753447E-01):c := 4.02812746428331E-01+I*(2.06621640062224E-02):d := -1.56935301680320E-01+I*(-3.53571081398999E-01):e := 7.04466362922016E-02+I*(3.84044726997420E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.92051607919871E-01+I*(7.88377895192000E-01):b := -6.57302722417962E-01+I*(-2.98568237579412E-02):c := 2.64107206795612E-01+I*(2.86792451751179E-01):d := -2.11912787891757E-01+I*(-4.08303508998814E-01):e := 1.41949621178057E-01+I*(3.69970993087524E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.93842363713860E-01+I*(4.95530228114001E-01):b := -5.19297826558069E-01+I*(-3.55199679012958E-01):c := -1.32126525946238E-02+I*(4.01501877553061E-01):d := -2.18846659391453E-01+I*(-4.85569827968488E-01):e := 2.23701269005021E-01+I*(3.82864081022423E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.06975310315482E-01+I*(2.70044824432192E-01):b := -2.04453586703419E-01+I*(-5.15718928254706E-01):c := -2.99385787466757E-01+I*(3.11116626225905E-01):d := -1.74492480643301E-01+I*(-5.49216268942628E-01):e := 3.18205012445301E-01+I*(4.47975498056045E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.11123811941971E-02+I*(2.17428810520413E-01):b := 1.39910878214036E-01+I*(-4.36305830790231E-01):c := -4.60508607553993E-01+I*(5.79289613858624E-02):d := -9.96040648253503E-02+I*(-5.69461954838034E-01):e := 3.68576542568116E-01+I*(6.30051088005607E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.11616602440221E-02+I*(4.24888820473405E-01):b := 3.87085835674553E-01+I*(-4.23138523780387E-02):c := -2.94200004540851E-01+I*(-7.66850387966762E-02):d := 1.77061591509899E-01+I*(-7.63966085559272E-01):e := 1.71274457937143E-01+I*(5.07721047550918E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.83004221315868E-01+I*(6.99463137687648E-01):b := 3.68677463386987E-01+I*(3.10608882192164E-01):c := -7.28375133280253E-02+I*(-2.79325617812996E-01):d := 2.10003936879895E-01+I*(-6.93731019512307E-01):e := 5.44676283955188E-02+I*(4.76238735298967E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.45271802545045E-02+I*(9.75262404008534E-01):b := 1.27721471130814E-01+I*(5.69130708239077E-01):c := 2.26990846391929E-01+I*(-2.92268240717910E-01):d := 1.90093007273382E-01+I*(-6.18752906017087E-01):e := 2.43465172435035E-02+I*(3.92676662562709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.68190960977057E-01+I*(1.12323707755710E+00):b := -2.23036154389741E-01+I*(6.12286390205292E-01):c := 4.64992052885003E-01+I*(-1.09456910412978E-01):d := 1.26645347938580E-01+I*(-5.74114837666936E-01):e := 4.47290785622156E-02+I*(3.33708774077435E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56900575447281E-01+I*(1.07414816402467E+00):b := -5.19472021956826E-01+I*(4.19882904876838E-01):c := 5.29802696544311E-01+I*(1.83568919930498E-01):d := 4.93488238204321E-02+I*(-5.80703462739762E-01):e := 8.11097146147944E-02+I*(3.00377800234377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.46511225895596E-01+I*(8.50964911615560E-01):b := -6.22880494618108E-01+I*(8.19479813654492E-02):c := 3.91097156911592E-01+I*(4.49699207675455E-01):d := -5.62866239100487E-03+I*(-6.35435890339576E-01):e := 1.24481699975287E-01+I*(2.85962698875353E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.48301981689586E-01+I*(5.58117244537561E-01):b := -4.84875598758215E-01+I*(-2.43394873889568E-01):c := 1.13777297521356E-01+I*(5.64408633477337E-01):d := -1.25625338907004E-02+I*(-7.12702209309250E-01):e := 1.74035612518203E-01+I*(2.91037719287795E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.61434928291207E-01+I*(3.32631840855752E-01):b := -1.70031358903564E-01+I*(-4.03914123131316E-01):c := -1.72395837350777E-01+I*(4.74023382150180E-01):d := 3.17916448574515E-02+I*(-7.76348650283390E-01):e := 2.26270438817953E-01+I*(3.27216964354554E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.73347236781528E-01+I*(2.80015826943974E-01):b := 1.74333106013890E-01+I*(-3.24501025666840E-01):c := -3.33518657438013E-01+I*(2.20835717310137E-01):d := 1.06680060675402E-01+I*(-7.96594336178796E-01):e := 2.50628163878128E-01+I*(4.14679815501884E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.53995874788772E-01+I*(3.09269767015702E-01):b := 3.41588048563673E-01+I*(6.54597788282885E-02):c := -3.01634503164902E-01+I*(1.29736342814918E-01):d := 4.81082280037848E-01+I*(-8.05362704190837E-01):e := 2.29717514461390E-01+I*(3.59994200949734E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.21533137169261E-02+I*(5.83844084229946E-01):b := 3.23179676276107E-01+I*(4.18382513398491E-01):c := -8.02720119520764E-02+I*(-7.29042362014016E-02):d := 5.14024625407844E-01+I*(-7.35127638143871E-01):e := 1.49999122560298E-01+I*(3.79650663712124E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.50630354778290E-01+I*(8.59643350550831E-01):b := 8.22236840199347E-02+I*(6.76904339445404E-01):c := 2.19556347767878E-01+I*(-8.58468591063157E-02):d := 4.94113695801331E-01+I*(-6.60149524648651E-01):e := 1.00115393635096E-01+I*(3.34676570457212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.03348496009851E-01+I*(1.00761802409940E+00):b := -2.68533941500620E-01+I*(7.20060021411620E-01):c := 4.57557554260952E-01+I*(9.69644711986156E-02):d := 4.30666036466529E-01+I*(-6.15511456298501E-01):e := 9.58266786887844E-02+I*(2.85337896758441E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.92058110480075E-01+I*(9.58529110566966E-01):b := -5.64969809067705E-01+I*(5.27656536083165E-01):c := 5.22368197920260E-01+I*(3.89990301542092E-01):d := 3.53369512348381E-01+I*(-6.22100081371326E-01):e := 1.13714342316231E-01+I*(2.50657547236125E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.81668760928391E-01+I*(7.35345858157858E-01):b := -6.68378281728987E-01+I*(1.89721612571777E-01):c := 3.83662658287541E-01+I*(6.56120589287049E-01):d := 2.98392026136944E-01+I*(-6.76832508971140E-01):e := 1.42134755998863E-01+I*(2.30119474088338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.83459516722380E-01+I*(4.42498191079859E-01):b := -5.30373385869095E-01+I*(-1.35621242683241E-01):c := 1.06342798897306E-01+I*(7.70830015088931E-01):d := 2.91458154637249E-01+I*(-7.54098827940815E-01):e := 1.78020001098916E-01+I*(2.23824957521709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.96592463324002E-01+I*(2.17012787398050E-01):b := -2.15529146014444E-01+I*(-2.96140491924989E-01):c := -1.79830335974828E-01+I*(6.80444763761774E-01):d := 3.35812333385401E-01+I*(-8.17745268914954E-01):e := 2.19210456435413E-01+I*(2.38103464873139E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.08504771814323E-01+I*(1.64396773486272E-01):b := 1.28835318903011E-01+I*(-2.16727394460513E-01):c := -3.40953156062064E-01+I*(4.27257098921732E-01):d := 4.10700749203351E-01+I*(-8.37990954810361E-01):e := 2.51409194691670E-01+I*(2.86465263597175E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.59818502751905E-01+I*(6.95440837522450E-02):b := 2.37459166782820E-01+I*(1.18773756305621E-01):c := -4.40014765997541E-01+I*(2.83085491539650E-01):d := 7.40584872617178E-01+I*(-6.41653622183326E-01):e := 2.91496494038558E-01+I*(2.61653806550008E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.57975941680058E-01+I*(3.44118400966488E-01):b := 2.19050794495254E-01+I*(4.71696490875823E-01):c := -2.18652274784716E-01+I*(8.04449125233308E-02):d := 7.73527217987174E-01+I*(-5.71418556136361E-01):e := 2.40251978689540E-01+I*(3.13450963935357E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.56452982741422E-01+I*(6.19917667287374E-01):b := -2.19051977609182E-02+I*(7.30218316922736E-01):c := 8.11760849352391E-02+I*(6.75022896184166E-02):d := 7.53616288380661E-01+I*(-4.96440442641141E-01):e := 1.76970849239276E-01+I*(2.99742679016380E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.09171123972983E-01+I*(7.67892340835943E-01):b := -3.72662823281473E-01+I*(7.73373998888952E-01):c := 3.19177291428313E-01+I*(2.50313619923348E-01):d := 6.90168629045859E-01+I*(-4.51802374290991E-01):e := 1.51848775571831E-01+I*(2.57637691903528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.97880738443208E-01+I*(7.18803427303508E-01):b := -6.69098690848558E-01+I*(5.80970513560497E-01):c := 3.83987935087621E-01+I*(5.43339450266825E-01):d := 6.12872104927711E-01+I*(-4.58390999363816E-01):e := 1.54871236339350E-01+I*(2.19876165487016E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.87491388891524E-01+I*(4.95620174894401E-01):b := -7.72507163509840E-01+I*(2.43035590049109E-01):c := 2.45282395454902E-01+I*(8.09469738011782E-01):d := 5.57894618716274E-01+I*(-5.13123426963630E-01):e := 1.72797254626591E-01+I*(1.92452168444811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.89282144685513E-01+I*(2.02772507816401E-01):b := -6.34502267649948E-01+I*(-8.23072652059085E-02):c := -3.20374639353337E-02+I*(9.24179163813664E-01):d := 5.50960747216579E-01+I*(-5.90389745933304E-01):e := 2.00840921519605E-01+I*(1.75968664526462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.02415091287135E-01+I*(-2.27128958654075E-02):b := -3.19658027795297E-01+I*(-2.42826514447657E-01):c := -3.18210598807467E-01+I*(8.33793912486507E-01):d := 5.95314925964731E-01+I*(-6.54036186907444E-01):e := 2.37920181269509E-01+I*(1.74499719280355E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.14327399777455E-01+I*(-7.53289097771859E-02):b := 2.47064371221573E-02+I*(-1.63413416983181E-01):c := -4.79333418894703E-01+I*(5.80606247646464E-01):d := 6.70203341782681E-01+I*(-6.74281872802850E-01):e := 2.78201967541637E-01+I*(1.99868916223691E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86790639933919E-01+I*(-1.82117917863796E-01):b := 1.23422251380868E-01+I*(9.26818774734542E-02):c := -6.44591130134064E-01+I*(3.11608636403270E-01):d := 8.34145222129956E-01+I*(-3.49440138431837E-01):e := 3.63459226154998E-01+I*(1.78326977568601E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.49480788620728E-02+I*(9.24563993504470E-02):b := 1.05013879093302E-01+I*(4.45604612043657E-01):c := -4.23228638921239E-01+I*(1.08968057386951E-01):d := 8.67087567499953E-01+I*(-2.79205072384871E-01):e := 3.44662965599897E-01+I*(2.58273715477841E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.83425119923437E-01+I*(3.68255665671333E-01):b := -1.35942113162870E-01+I*(7.04126438090569E-01):c := -1.23400279201284E-01+I*(9.60254344820364E-02):d := 8.47176637893439E-01+I*(-2.04226958889651E-01):e := 2.69071027953816E-01+I*(2.80910163664570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.36143261154998E-01+I*(5.16230339219901E-01):b := -4.86699738683425E-01+I*(7.47282120056785E-01):c := 1.14600927291790E-01+I*(2.78836764786968E-01):d := 7.83728978558638E-01+I*(-1.59588890539501E-01):e := 2.19430394109717E-01+I*(2.46411509914827E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.24852875625223E-01+I*(4.67141425687467E-01):b := -7.83135606250510E-01+I*(5.54878634728330E-01):c := 1.79411570951097E-01+I*(5.71862595130444E-01):d := 7.06432454440490E-01+I*(-1.66177515612326E-01):e := 2.06371395232581E-01+I*(2.03324463734168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.14463526073538E-01+I*(2.43958173278360E-01):b := -8.86544078911792E-01+I*(2.16943711216942E-01):c := 4.07060313183782E-02+I*(8.37992882875402E-01):d := 6.51454968229053E-01+I*(-2.20909943212141E-01):e := 2.14555692193046E-01+I*(1.67127841072525E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.16254281867527E-01+I*(-4.88894937996399E-02):b := -7.48539183051899E-01+I*(-1.08399144038075E-01):c := -2.36613828071857E-01+I*(9.52702308677283E-01):d := 6.44521096729357E-01+I*(-2.98176262181814E-01):e := 2.36570664298970E-01+I*(1.39672946194358E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.29387228469149E-01+I*(-2.74374897481449E-01):b := -4.33694943197249E-01+I*(-2.68918393279823E-01):c := -5.22786962943991E-01+I*(8.62317057350127E-01):d := 6.88875275477509E-01+I*(-3.61822703155954E-01):e := 2.71638266797950E-01+I*(1.23513355383617E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.41299536959469E-01+I*(-3.26990911393227E-01):b := -8.93304782797945E-02+I*(-1.89505295815348E-01):c := -6.83909783031226E-01+I*(6.09129392510084E-01):d := 7.63763691295459E-01+I*(-3.82068389051360E-01):e := 3.19779420084229E-01+I*(1.29165253452197E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09171650383591E-02+I*(-3.27960790364675E-01):b := 5.28364424535329E-02+I*(-6.07177583707166E-04):c := -8.19640041181962E-01+I*(2.01959480924645E-01):d := 7.17985401231693E-01+I*(-6.54521895748141E-02):e := 4.66009871754073E-01+I*(9.27673936645499E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32759726110206E-01+I*(-5.33864731504314E-02):b := 3.44280701659671E-02+I*(3.52315556986495E-01):c := -5.98277549969136E-01+I*(-6.81098091674972E-04):d := 7.50927746601689E-01+I*(4.78287647215144E-03):e := 4.98830080458526E-01+I*(2.09299189674756E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.42826850488415E-02+I*(2.22412793170454E-01):b := -2.06527922090205E-01+I*(6.10837383033408E-01):c := -2.98449190249182E-01+I*(-1.36237209965892E-02):d := 7.31016816995176E-01+I*(7.97609899673718E-02):e := 4.03074248080641E-01+I*(2.92577711871459E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.18435456182719E-01+I*(3.70387466719023E-01):b := -5.57285547610760E-01+I*(6.53993064999624E-01):c := -6.04479837561079E-02+I*(1.69187609308343E-01):d := 6.67569157660375E-01+I*(1.24399058317522E-01):e := 3.11195078821828E-01+I*(2.65097663188065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.07145070652944E-01+I*(3.21298553186588E-01):b := -8.53721415177845E-01+I*(4.61589579671169E-01):c := 4.36265990319999E-03+I*(4.62213439651819E-01):d := 5.90272633542227E-01+I*(1.17810433244697E-01):e := 2.75718369675752E-01+I*(2.08747863951156E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.96755721101259E-01+I*(9.81153007774809E-02):b := -9.57129887839127E-01+I*(1.23654656159781E-01):c := -1.34342879729519E-01+I*(7.28343727396776E-01):d := 5.35295147330790E-01+I*(6.30780056448823E-02):e := 2.73317170506320E-01+I*(1.57428001541338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.98546476895248E-01+I*(-1.94732366300518E-01):b := -8.19124991979235E-01+I*(-2.01688199095236E-01):c := -4.11662739119755E-01+I*(8.43053153198657E-01):d := 5.28361275831094E-01+I*(-1.41883133247917E-02):e := 2.90447136180853E-01+I*(1.14336253849953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.11679423496870E-01+I*(-4.20217769982327E-01):b := -5.04280752124584E-01+I*(-3.62207448336984E-01):c := -6.97835873991888E-01+I*(7.52667901871501E-01):d := 5.72715454579246E-01+I*(-7.78347542989318E-02):e := 3.25605277735675E-01+I*(7.97953848144701E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.23591731987191E-01+I*(-4.72833783894106E-01):b := -1.59916287207130E-01+I*(-2.82794350872509E-01):c := -8.58958694079124E-01+I*(4.99480237031458E-01):d := 6.47603870397196E-01+I*(-9.80804401943377E-02):e := 3.84465860348160E-01+I*(6.20034025355170E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.91437010665661E-01+I*(-2.99743032844248E-01):b := 5.87296244717987E-02+I*(-1.17442423212259E-01):c := -8.83254168209978E-01+I*(5.44408356684525E-03):d := 4.46457881093294E-01+I*(7.74291069430535E-02):e := 6.61657662116130E-01+I*(-4.01661254734034E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.93279571737508E-01+I*(-2.51687156300048E-02):b := 4.03212521842329E-02+I*(2.35480311357944E-01):c := -6.61891676997153E-01+I*(-1.97196495449474E-01):d := 4.79400226463290E-01+I*(1.47664172990019E-01):e := 8.14697563513863E-01+I*(2.08764172571987E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.94802530676144E-01+I*(2.50630550690881E-01):b := -2.00634740071940E-01+I*(4.94002137404857E-01):c := -3.62063317277198E-01+I*(-2.10139118354389E-01):d := 4.59489296856777E-01+I*(2.22642286485239E-01):e := 6.21153435519047E-01+I*(4.39969290429906E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.20843894445828E-02+I*(3.98605224239450E-01):b := -5.51392365592495E-01+I*(5.37157819371072E-01):c := -1.24062110784125E-01+I*(-2.73277880494569E-02):d := 3.96041637521975E-01+I*(2.67280354835389E-01):e := 4.25881524161319E-01+I*(3.79329668770957E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.46625225025642E-01+I*(3.49516310707015E-01):b := -8.47828233159579E-01+I*(3.44754334042618E-01):c := -5.92514671248166E-02+I*(2.65698042294019E-01):d := 3.18745113403827E-01+I*(2.60691729762564E-01):e := 3.62989643572184E-01+I*(2.74500079395572E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.36235875473957E-01+I*(1.26333058297908E-01):b := -9.51236705820861E-01+I*(6.81941053122957E-03):c := -1.97957006757536E-01+I*(5.31828330038976E-01):d := 2.63767627192390E-01+I*(2.05959302162750E-01):e := 3.55850768389472E-01+I*(1.88480472710099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.38026631267946E-01+I*(-1.66514608780092E-01):b := -8.13231809960969E-01+I*(-3.18523444723788E-01):c := -4.75276866147771E-01+I*(6.46537755840858E-01):d := 2.56833755692695E-01+I*(1.28692983193076E-01):e := 3.75656747188492E-01+I*(1.16558209982223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.51159577869568E-01+I*(-3.92000012461900E-01):b := -4.98387570106318E-01+I*(-4.79042693965536E-01):c := -7.61450001019905E-01+I*(5.56152504513702E-01):d := 3.01187934440847E-01+I*(6.50465422189355E-02):e := 4.20118823398843E-01+I*(5.19580249304455E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69281136401111E-02+I*(-4.44616026373679E-01):b := -1.54023105188864E-01+I*(-3.99629596501061E-01):c := -9.22572821107140E-01+I*(3.02964839673659E-01):d := 3.76076350258797E-01+I*(4.48008563235296E-02):e := 5.04449513129868E-01+I*(-2.85780107364834E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07354608795227E-01+I*(-1.55932457770657E-01):b := -1.16357608444677E-01+I*(-1.46002123928236E-01):c := -6.39298610291536E-01+I*(-6.19961746557341E-01):d := 3.22331185765830E-02+I*(2.12611800121183E-01):e := 5.41884753792531E-01+I*(-6.72621823322814E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.09197169867073E-01+I*(1.18641859443586E-01):b := -1.34765980732243E-01+I*(2.06920610641966E-01):c := -4.17936119078711E-01+I*(-8.22602325573661E-01):d := 6.51754639465790E-02+I*(2.82846866168148E-01):e := 7.46725973103266E-01+I*(-1.21569838889888E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.10720128805709E-01+I*(3.94441125764472E-01):b := -3.75721972988416E-01+I*(4.65442436688879E-01):c := -1.18107759358756E-01+I*(-8.35544948478575E-01):d := 4.52645343400657E-02+I*(3.57824979663369E-01):e := 2.86745181573090E+00+I*(-1.32887429587147E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.58001987574148E-01+I*(5.42415799313041E-01):b := -7.26479598508970E-01+I*(5.08598118655094E-01):c := 1.19893447134318E-01+I*(-6.52733618173643E-01):d := -1.81831249947358E-02+I*(4.02463048013519E-01):e := 1.49846024576413E+00+I*(7.82494708947029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.07076268960766E-02+I*(4.93326885780606E-01):b := -1.02291546607606E+00+I*(3.16194633326640E-01):c := 1.84704090793626E-01+I*(-3.59707787830167E-01):d := -9.54796491128836E-02+I*(3.95874422940693E-01):e := 8.61034239663022E-01+I*(3.85271513129104E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.20318277344392E-01+I*(2.70143633371499E-01):b := -1.12632393873734E+00+I*(-2.17402901847489E-02):c := 4.59985511609063E-02+I*(-9.35775000852094E-02):d := -1.50457135324321E-01+I*(3.41141995340879E-01):e := 6.84347009370821E-01+I*(1.31067229903621E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.22109033138381E-01+I*(-2.27040337065007E-02):b := -9.88319042877444E-01+I*(-3.47083145439766E-01):c := -2.31321308229329E-01+I*(2.11319257166722E-02):d := -1.57391006824016E-01+I*(2.63875676371205E-01):e := 6.04224795765302E-01+I*(-5.10967424429083E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.52419797400027E-02+I*(-2.48189437388310E-01):b := -6.73474803022794E-01+I*(-5.07602394681513E-01):c := -5.17494443101463E-01+I*(-6.92533256104843E-02):d := -1.13036828075864E-01+I*(2.00229235397065E-01):e := 5.57977520593822E-01+I*(-2.15557910212825E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.52845711769676E-01+I*(-3.00805451300088E-01):b := -3.29110338105339E-01+I*(-4.28189297217038E-01):c := -6.78617263188698E-01+I*(-3.22440990450527E-01):d := -3.81484122579139E-02+I*(1.79983549501659E-01):e := 5.32116126371837E-01+I*(-4.01588440009537E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.24804338855743E-01+I*(1.05529468187923E-01):b := -2.74012406462762E-04+I*(-1.60486700077402E-01):c := -4.56815200619588E-01+I*(-7.16733972690310E-01):d := -1.55627749053103E-01+I*(-2.99795301042746E-02):e := 9.34070602701208E-01+I*(-1.85440761410221E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.26646899927589E-01+I*(3.80103785402166E-01):b := -1.86823846940286E-02+I*(1.92436034492800E-01):c := -2.35452709406763E-01+I*(-9.19374551706630E-01):d := -1.22685403683107E-01+I*(4.02555359426907E-02):e := -3.94272969068853E+00+I*(-3.47273913097690E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.28169858866225E-01+I*(6.55903051723052E-01):b := -2.59638376950201E-01+I*(4.50957860539713E-01):c := 6.43756503131924E-02+I*(-9.32317174611544E-01):d := -1.42596333289620E-01+I*(1.15233649437911E-01):e := -1.35677387280412E+00+I*(2.06266149411399E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.75451717634665E-01+I*(8.03877725271621E-01):b := -6.10396002470756E-01+I*(4.94113542505928E-01):c := 3.02376856806266E-01+I*(-7.49505844306612E-01):d := -2.06043992624422E-01+I*(1.59871717788061E-01):e := 2.64356390812633E-02+I*(1.34128871001507E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32578968355602E-02+I*(7.54788811739187E-01):b := -9.06831870037841E-01+I*(3.01710057177474E-01):c := 3.67187500465574E-01+I*(-4.56480013963136E-01):d := -2.83340516742569E-01+I*(1.53283092715236E-01):e := 4.45627836353918E-01+I*(8.80022490724676E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.02868547283876E-01+I*(5.31605559330079E-01):b := -1.01024034269912E+00+I*(-3.62248663339146E-02):c := 2.28481960832855E-01+I*(-1.90349726218178E-01):d := -3.38318002954006E-01+I*(9.85506651154212E-02):e := 6.61942568691746E-01+I*(5.45371216201672E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.04659303077865E-01+I*(2.38757892252080E-01):b := -8.72235446839230E-01+I*(-3.61567721588931E-01):c := -4.88378985573811E-02+I*(-7.56403004162967E-02):d := -3.45251874453702E-01+I*(2.12843461457473E-02):e := 8.12280419094745E-01+I*(2.38238682024392E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.77922496794864E-02+I*(1.32724885702707E-02):b := -5.57391206984579E-01+I*(-5.22086970830679E-01):c := -3.35011033429515E-01+I*(-1.66025551743453E-01):d := -3.00897695705550E-01+I*(-4.23620948283926E-02):e := 9.37976631617423E-01+I*(-1.17054199538255E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70295441830193E-01+I*(-3.93435253415080E-02):b := -2.13026742067125E-01+I*(-4.42673873366204E-01):c := -4.96133853516750E-01+I*(-4.19213216583496E-01):d := -2.26009279887600E-01+I*(-6.26077807237985E-02):e := 1.04245670988659E+00+I*(-6.55173010978216E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.70107121191573E-01+I*(3.17037393930954E-01):b := 9.79616873561246E-02+I*(-9.69654319261826E-02):c := -2.54820810758932E-01+I*(-6.73567724057243E-01):d := -1.43602821494034E-01+I*(-3.36569908629653E-01):e := 1.54620134356165E+00+I*(3.09375287257340E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.71949682263419E-01+I*(5.91611711145197E-01):b := 7.95533150685587E-02+I*(2.55957302644020E-01):c := -3.34583195461063E-02+I*(-8.76208303073562E-01):d := -1.10660476124037E-01+I*(-2.66334842582687E-01):e := -6.22356501305064E-01+I*(1.52182384167076E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73472641202055E-01+I*(8.67410977466083E-01):b := -1.61402677187614E-01+I*(5.14479128690932E-01):c := 2.66370040173849E-01+I*(-8.89150925978477E-01):d := -1.30571405730551E-01+I*(-1.91356729087467E-01):e := -2.69287747588500E-01+I*(8.92296494057667E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20754499970495E-01+I*(1.01538565101465E+00):b := -5.12160302708168E-01+I*(5.57634810657148E-01):c := 5.04371246666922E-01+I*(-7.06339595673545E-01):d := -1.94019065065352E-01+I*(-1.46718660737317E-01):e := -3.52661991241684E-02+I*(6.95552940446426E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.67955114499730E-01+I*(9.66296737482217E-01):b := -8.08596170275254E-01+I*(3.65231325328694E-01):c := 5.69181890326230E-01+I*(-4.13313765330068E-01):d := -2.71315589183500E-01+I*(-1.53307285810142E-01):e := 1.38508477727690E-01+I*(5.95458525148249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.57565764948046E-01+I*(7.43113485073109E-01):b := -9.12004642936535E-01+I*(2.72964018173048E-02):c := 4.30476350693510E-01+I*(-1.47183477585111E-01):d := -3.26293075394937E-01+I*(-2.08039713409957E-01):e := 3.00309182248489E-01+I*(5.28618642869154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.59356520742035E-01+I*(4.50265817995110E-01):b := -7.73999747076643E-01+I*(-2.98046453437712E-01):c := 1.53156491303275E-01+I*(-3.24740517832297E-02):d := -3.33226946894633E-01+I*(-2.85306032379631E-01):e := 4.89461390804263E-01+I*(4.77784871493528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.72489467343656E-01+I*(2.24780414313301E-01):b := -4.59155507221992E-01+I*(-4.58565702679460E-01):c := -1.33016643568859E-01+I*(-1.22859303110386E-01):d := -2.88872768146481E-01+I*(-3.48952473353771E-01):e := 7.77831539981764E-01+I*(4.50795103354539E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15598224166023E-01+I*(1.72164400401523E-01):b := -1.14791042304538E-01+I*(-3.79152605214985E-01):c := -2.94139463656094E-01+I*(-3.76046967950429E-01):d := -2.13984352328530E-01+I*(-3.69198159249177E-01):e := 1.40859786680337E+00+I*(6.02096576778707E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15647503215848E-01+I*(3.79624410354514E-01):b := 1.32383915155979E-01+I*(1.48393731972076E-02):c := -1.27830860642952E-01+I*(-5.10660968132968E-01):d := 6.26813040067185E-02+I*(-5.63702289970415E-01):e := 5.23491253778739E-01+I*(8.73215211465370E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.17490064287695E-01+I*(6.54198727568758E-01):b := 1.13975542868413E-01+I*(3.67762107767410E-01):c := 9.35316305698735E-02+I*(-7.13301547149287E-01):d := 9.56236493767143E-02+I*(-4.93467223923449E-01):e := 1.08927374044504E-01+I*(8.58203236575759E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19013023226330E-01+I*(9.29997993889643E-01):b := -1.26980449387759E-01+I*(6.26283933814322E-01):c := 3.93359990289829E-01+I*(-7.26244170054201E-01):d := 7.57127197702011E-02+I*(-4.18489110428229E-01):e := 2.53082159055589E-02+I*(6.19718963944769E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.33705118005231E-01+I*(1.07797266743821E+00):b := -4.77738074908314E-01+I*(6.69439615780538E-01):c := 6.31361196782902E-01+I*(-5.43432839749270E-01):d := 1.22650604353996E-02+I*(-3.73851042078079E-01):e := 7.27925607124357E-02+I*(4.84652678759073E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.22414732475455E-01+I*(1.02888375390578E+00):b := -7.74173942475399E-01+I*(4.77036130452084E-01):c := 6.96171840442210E-01+I*(-2.50407009405794E-01):d := -6.50314636827482E-02+I*(-3.80439667150904E-01):e := 1.40922069480112E-01+I*(4.11039379845041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.12025382923771E-01+I*(8.05700501496670E-01):b := -8.77582415136681E-01+I*(1.39101206940695E-01):c := 5.57466300809491E-01+I*(1.57232783391639E-02):d := -1.20008949894185E-01+I*(-4.35172094750719E-01):e := 2.17312192456980E-01+I*(3.68320432561911E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.13816138717760E-01+I*(5.12852834418671E-01):b := -7.39577519276788E-01+I*(-1.86241648314322E-01):c := 2.80146441419255E-01+I*(1.30432704141046E-01):d := -1.26942821393880E-01+I*(-5.12438413720393E-01):e := 3.09250427770852E-01+I*(3.49063222454932E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26949085319381E-01+I*(2.87367430736861E-01):b := -4.24733279422138E-01+I*(-3.46760897556070E-01):c := -6.02669345287856E-03+I*(4.00474528138890E-02):d := -8.25886426457286E-02+I*(-5.76084854694533E-01):e := 4.32530011450550E-01+I*(3.68980713442900E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.38861393809702E-01+I*(2.34751416825083E-01):b := -8.03688145046833E-02+I*(-2.67347800091594E-01):c := -1.67149513540114E-01+I*(-2.13140212026154E-01):d := -7.70022682777837E-03+I*(-5.96330540589939E-01):e := 5.88374998558132E-01+I*(5.06596806817930E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19510031816947E-01+I*(2.64005356896812E-01):b := 8.68861280450997E-02+I*(1.22613004403535E-01):c := -1.35265359267003E-01+I*(-3.04239586521373E-01):d := 3.66701992534668E-01+I*(-6.05098908601980E-01):e := 4.74263804664512E-01+I*(4.25522687384375E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.76674707451002E-02+I*(5.38579674111055E-01):b := 6.84777557575339E-02+I*(4.75535738973737E-01):c := 8.60971319458230E-02+I*(-5.06880165537693E-01):d := 3.99644337904664E-01+I*(-5.34863842555014E-01):e := 3.25683457798723E-01+I*(5.44675180826220E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16144511806464E-01+I*(8.14378940431941E-01):b := -1.72478236498638E-01+I*(7.34057565020650E-01):c := 3.85925491665778E-01+I*(-5.19822788442607E-01):d := 3.79733408298150E-01+I*(-4.59885729059794E-01):e := 1.90244813369746E-01+I*(4.74139074603880E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.68862653038025E-01+I*(9.62353613980510E-01):b := -5.23235862019194E-01+I*(7.77213246986865E-01):c := 6.23926698158852E-01+I*(-3.37011458137675E-01):d := 3.16285748963349E-01+I*(-4.15247660709644E-01):e := 1.64389703647529E-01+I*(3.78311418223696E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.57572267508250E-01+I*(9.13264700448075E-01):b := -8.19671729586278E-01+I*(5.84809761658411E-01):c := 6.88737341818160E-01+I*(-4.39856277941988E-02):d := 2.38989224845201E-01+I*(-4.21836285782469E-01):e := 1.83918109067387E-01+I*(3.10903417033418E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.47182917956566E-01+I*(6.90081448038968E-01):b := -9.23080202247561E-01+I*(2.46874838147023E-01):c := 5.50031802185440E-01+I*(2.22144659950758E-01):d := 1.84011738633764E-01+I*(-4.76568713382284E-01):e := 2.21607039158274E-01+I*(2.65687074059194E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.48973673750554E-01+I*(3.97233780960968E-01):b := -7.85075306387668E-01+I*(-7.84680171079944E-02):c := 2.72711942795204E-01+I*(3.36854085752640E-01):d := 1.77077867134069E-01+I*(-5.53835032351957E-01):e := 2.73410416950408E-01+I*(2.37431429819346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.62106620352176E-01+I*(1.71748377279160E-01):b := -4.70231066533017E-01+I*(-2.38987266349742E-01):c := -1.34611920769291E-02+I*(2.46468834425483E-01):d := 2.21432045882220E-01+I*(-6.17481473326098E-01):e := 3.43856521326388E-01+I*(2.31477531289441E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.74018928842497E-01+I*(1.19132363367381E-01):b := -1.25866601615563E-01+I*(-1.59574168885267E-01):c := -1.74584012164165E-01+I*(-6.71883041455941E-03):d := 2.96320461700171E-01+I*(-6.37727159221503E-01):e := 4.33521792713200E-01+I*(2.76657301508528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25332659780079E-01+I*(2.42796736333547E-02):b := -1.72427537357534E-02+I*(1.75926981880867E-01):c := -2.73645622099642E-01+I*(-1.50890437796641E-01):d := 6.26204585113997E-01+I*(-4.41389826594469E-01):e := 4.66361417801459E-01+I*(2.01005979441753E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.23490098708233E-01+I*(2.98853990847598E-01):b := -3.56511260233194E-02+I*(5.28849716451069E-01):c := -5.22831308868162E-02+I*(-3.53531016812960E-01):d := 6.59146930483994E-01+I*(-3.71154760547504E-01):e := 4.42581204682612E-01+I*(3.31048747497564E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21967139769597E-01+I*(5.74653257168484E-01):b := -2.76607118279492E-01+I*(7.87371542497982E-01):c := 2.47545228833139E-01+I*(-3.66473639717874E-01):d := 6.39236000877480E-01+I*(-2.96176647052284E-01):e := 3.20593190882424E-01+I*(3.62472441271065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.74685281001158E-01+I*(7.22627930717053E-01):b := -6.27364743800047E-01+I*(8.30527224464198E-01):c := 4.85546435326213E-01+I*(-1.83662309412943E-01):d := 5.75788341542679E-01+I*(-2.51538578702133E-01):e := 2.50930618418234E-01+I*(3.05359411214068E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.63394895471382E-01+I*(6.73539017184619E-01):b := -9.23800611367132E-01+I*(6.38123739135743E-01):c := 5.50357078985521E-01+I*(1.09363520930534E-01):d := 4.98491817424531E-01+I*(-2.58127203774959E-01):e := 2.36411032302466E-01+I*(2.43827103381919E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.53005545919698E-01+I*(4.50355764775510E-01):b := -1.02720908402841E+00+I*(3.00188815624354E-01):c := 4.11651539352801E-01+I*(3.75493808675491E-01):d := 4.43514331213094E-01+I*(-3.12859631374773E-01):e := 2.48808048040047E-01+I*(1.94821884831435E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.54796301713687E-01+I*(1.57508097697511E-01):b := -8.89204188168521E-01+I*(-2.51540396306624E-02):c := 1.34331679962565E-01+I*(4.90203234477372E-01):d := 4.36580459713398E-01+I*(-3.90125950344447E-01):e := 2.77950648389591E-01+I*(1.57270184619338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.67929248315309E-01+I*(-6.79773059842979E-02):b := -5.74359948313870E-01+I*(-1.85673288872410E-01):c := -1.51841454909569E-01+I*(3.99817983150216E-01):d := 4.80934638461550E-01+I*(-4.53772391318587E-01):e := 3.24483594903683E-01+I*(1.32489352842500E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.79841556805629E-01+I*(-1.20593319896076E-01):b := -2.29995483396416E-01+I*(-1.06260191407935E-01):c := -3.12964274996804E-01+I*(1.46630318310173E-01):d := 5.55823054279501E-01+I*(-4.74018077213993E-01):e := 3.93014566881012E-01+I*(1.34035343758158E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52304796962093E-01+I*(-2.27382327982687E-01):b := -1.31279669137705E-01+I*(1.49835103048701E-01):c := -4.78221986236165E-01+I*(-1.22367292933021E-01):d := 7.19764934626776E-01+I*(-1.49176342842979E-01):e := 4.67643875244222E-01+I*(3.56509743124615E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04622358902470E-02+I*(4.71919892315567E-02):b := -1.49688041425271E-01+I*(5.02757837618903E-01):c := -2.56859495023340E-01+I*(-3.25007871949341E-01):d := 7.52707279996772E-01+I*(-7.89412767960142E-02):e := 5.29189838248402E-01+I*(1.39716880094013E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.48939276951611E-01+I*(3.22991255552443E-01):b := -3.90644033681443E-01+I*(7.61279663665816E-01):c := 4.29688646966153E-02+I*(-3.37950494854255E-01):d := 7.32796350390259E-01+I*(-3.96316330079393E-03):e := 4.54505716172265E-01+I*(2.50751938067764E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.01657418183172E-01+I*(4.70965929101011E-01):b := -7.41401659201998E-01+I*(8.04435345632031E-01):c := 2.80970071189689E-01+I*(-1.55139164549323E-01):d := 6.69348691055457E-01+I*(4.06749050493559E-02):e := 3.50414088059599E-01+I*(2.43582750329808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.90367032653397E-01+I*(4.21877015568577E-01):b := -1.03783752676908E+00+I*(6.12031860303577E-01):c := 3.45780714848997E-01+I*(1.37886665794154E-01):d := 5.92052166937310E-01+I*(3.40862799765308E-02):e := 3.01795079397033E-01+I*(1.90792978500416E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.79977683101712E-01+I*(1.98693763159469E-01):b := -1.14124599943037E+00+I*(2.74096936792188E-01):c := 2.07075175216277E-01+I*(4.04016953539111E-01):d := 5.37074680725872E-01+I*(-2.06461476232837E-02):e := 2.90501227863851E-01+I*(1.37906846096374E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.81768438895701E-01+I*(-9.41539039185303E-02):b := -1.00324110357047E+00+I*(-5.12459184628289E-02):c := -7.02446841739583E-02+I*(5.18726379340992E-01):d := 5.30140809226177E-01+I*(-9.79124665929576E-02):e := 3.00847468895606E-01+I*(9.14202747859923E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.94901385497323E-01+I*(-3.19639307600339E-01):b := -6.88396863715822E-01+I*(-2.11765167704577E-01):c := -3.56417819046092E-01+I*(4.28341128013836E-01):d := 5.74494987974329E-01+I*(-1.61558907567097E-01):e := 3.29921559208533E-01+I*(5.14199606832453E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.06813693987644E-01+I*(-3.72255321512118E-01):b := -3.44032398798368E-01+I*(-1.32352070240101E-01):c := -5.17540639133327E-01+I*(1.75153463173793E-01):d := 6.49383403792279E-01+I*(-1.81804593462503E-01):e := 3.83600479838941E-01+I*(2.36365842471540E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.54030080101848E-02+I*(-3.73225200483565E-01):b := -2.01865478065040E-01+I*(5.65460479915392E-02):c := -6.53270897284063E-01+I*(-2.32016448411646E-01):d := 6.03605113728513E-01+I*(1.34811606014043E-01):e := 4.74596372139424E-01+I*(-1.23915171238899E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.67245569082031E-01+I*(-9.86508832693219E-02):b := -2.20273850352606E-01+I*(4.09468782561741E-01):c := -4.31908406071237E-01+I*(-4.34657027427966E-01):d := 6.36547459098509E-01+I*(2.05046672061009E-01):e := 6.09524946532150E-01+I*(-7.96180501300027E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.87685280206674E-02+I*(1.77148383051564E-01):b := -4.61229842608779E-01+I*(6.67990608608655E-01):c := -1.32080046351283E-01+I*(-4.47599650332880E-01):d := 6.16636529491996E-01+I*(2.80024785556229E-01):e := 6.34823090534762E-01+I*(1.04948086928451E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.83949613210894E-01+I*(3.25123056600132E-01):b := -8.11987468129334E-01+I*(7.11146290574870E-01):c := 1.05921160141791E-01+I*(-2.64788320027948E-01):d := 5.53188870157194E-01+I*(3.24662853906379E-01):e := 4.95811687448478E-01+I*(1.84914308145515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.72659227681118E-01+I*(2.76034143067698E-01):b := -1.10842333569642E+00+I*(5.18742805246415E-01):c := 1.70731803801099E-01+I*(2.82375103155280E-02):d := 4.75892346039046E-01+I*(3.18074228833554E-01):e := 3.97256777298759E-01+I*(1.47050954430924E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.62269878129433E-01+I*(5.28508906585906E-02):b := -1.21183180835770E+00+I*(1.80807881735026E-01):c := 3.20262641683797E-02+I*(2.94367798060485E-01):d := 4.20914859827609E-01+I*(2.63341801233739E-01):e := 3.54852162777449E-01+I*(8.77166568060040E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.64060633923423E-01+I*(-2.39996776419409E-01):b := -1.07382691249781E+00+I*(-1.44534973519991E-01):c := -2.45293595221856E-01+I*(4.09077223862366E-01):d := 4.13980988327913E-01+I*(1.86075482264065E-01):e := 3.43557097802479E-01+I*(2.94355413208858E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.77193580525044E-01+I*(-4.65482180101217E-01):b := -7.58982672643157E-01+I*(-3.05054222761738E-01):c := -5.31466730093989E-01+I*(3.18691972535210E-01):d := 4.58335167076065E-01+I*(1.22429041289925E-01):e := 3.54318869231677E-01+I*(-2.72666633736446E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.89105889015366E-01+I*(-5.18098194012996E-01):b := -4.14618207725703E-01+I*(-2.25641125297263E-01):c := -6.92589550181225E-01+I*(6.55043076951675E-02):d := 5.33223582894016E-01+I*(1.02183355394519E-01):e := 3.91696369814983E-01+I*(-8.28873959951508E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.25922853637487E-01+I*(-3.45007442963139E-01):b := -1.95972296046775E-01+I*(-6.02891976370122E-02):c := -7.16885024312080E-01+I*(-4.28531845769446E-01):d := 3.32077593590114E-01+I*(2.77692902531911E-01):e := 4.91239428055429E-01+I*(-3.23537022233844E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.27765414709333E-01+I*(-7.04331257488953E-02):b := -2.14380668334340E-01+I*(2.92633536933190E-01):c := -4.95522533099254E-01+I*(-6.31172424785766E-01):d := 3.65019938960110E-01+I*(3.47927968578876E-01):e := 6.96592841129861E-01+I*(-4.14397649422349E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.29288373647969E-01+I*(2.05366140571991E-01):b := -4.55336660590513E-01+I*(5.51155362980103E-01):c := -1.95694173379299E-01+I*(-6.44115047690680E-01):d := 3.45109009353597E-01+I*(4.22906082074096E-01):e := 9.91226163198949E-01+I*(-1.68390119887471E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.65702324164086E-02+I*(3.53340814120559E-01):b := -8.06094286111068E-01+I*(5.94311044946318E-01):c := 4.23070331137744E-02+I*(-4.61303717385748E-01):d := 2.81661350018795E-01+I*(4.67544150424246E-01):e := 7.90362314725616E-01+I*(1.55945653724552E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.12139382053816E-01+I*(3.04251900588125E-01):b := -1.10253015367815E+00+I*(4.01907559617864E-01):c := 1.07117676773083E-01+I*(-1.68277887042271E-01):d := 2.04364825900647E-01+I*(4.60955525351421E-01):e := 5.69093797631806E-01+I*(1.36848810993800E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.01750032502131E-01+I*(8.10686481790171E-02):b := -1.20593862633943E+00+I*(6.39726361064751E-02):c := -3.15878628596370E-02+I*(9.78524007026856E-02):d := 1.49387339689210E-01+I*(4.06223097751607E-01):e := 4.69573364388174E-01+I*(5.27905539874555E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.03540788296121E-01+I*(-2.11779018898982E-01):b := -1.06793373047954E+00+I*(-2.61370219148542E-01):c := -3.08907722249873E-01+I*(2.12561826504567E-01):d := 1.42453468189515E-01+I*(3.28956778781933E-01):e := 4.25628968898092E-01+I*(-3.14196863858286E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.16673734897742E-01+I*(-4.37264422580791E-01):b := -7.53089490624891E-01+I*(-4.21889468390289E-01):c := -5.95080857122006E-01+I*(1.22176575177411E-01):d := 1.86807646937667E-01+I*(2.65310337807793E-01):e := 4.11108154484587E-01+I*(-1.16052212833460E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.14139566119368E-02+I*(-4.89880436492570E-01):b := -4.08725025707437E-01+I*(-3.42476370925814E-01):c := -7.56203677209242E-01+I*(-1.31011089662632E-01):d := 2.61696062755617E-01+I*(2.45064651912387E-01):e := 4.24576945966937E-01+I*(-2.10437614425643E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.62867699154260E-01+I*(-1.68439935041406E-01):b := -3.48207984563050E-01+I*(-2.65939451742698E-01):c := -2.32898101822520E-01+I*(-8.45466571341075E-01):d := -1.84114351540895E-01+I*(2.92500536290514E-01):e := 2.53099999933772E-02+I*(-6.43313601956055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.64710260226107E-01+I*(1.06134382172837E-01):b := -3.66616356850616E-01+I*(8.69832828275040E-02):c := -1.15356106096942E-02+I*(-1.04810715035739E+00):d := -1.51172006170899E-01+I*(3.62735602337479E-01):e := -1.81314031203150E-01+I*(-7.58093824183982E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.66233219164743E-01+I*(3.81933648493723E-01):b := -6.07572349106788E-01+I*(3.45505108874417E-01):c := 2.88292749110261E-01+I*(-1.06104977326231E+00):d := -1.71082935777412E-01+I*(4.37713715832699E-01):e := -4.99621728270684E-01+I*(-1.03512835182602E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13515077933182E-01+I*(5.29908322042292E-01):b := -9.58329974627344E-01+I*(3.88660790840632E-01):c := 5.26293955603335E-01+I*(-8.78238442957377E-01):d := -2.34530595112214E-01+I*(4.82351784182849E-01):e := -8.71243884753329E-01+I*(-2.32898127536122E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.48054634629571E-02+I*(4.80819408509857E-01):b := -1.25476584219443E+00+I*(1.96257305512178E-01):c := 5.91104599262643E-01+I*(-5.85212612613901E-01):d := -3.11827119230361E-01+I*(4.75763159110024E-01):e := 2.17942909739479E+00+I*(-1.56762467171450E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.64805186985358E-01+I*(2.57636156100750E-01):b := -1.35817431485571E+00+I*(-1.41677617999211E-01):c := 4.52399059629923E-01+I*(-3.19082324868943E-01):d := -3.66804605441799E-01+I*(4.21030731510210E-01):e := 1.06515844570205E+00+I*(-5.44581193509884E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.66595942779347E-01+I*(-3.52115109772499E-02):b := -1.22016941899582E+00+I*(-4.67020473254228E-01):c := 1.75079200239687E-01+I*(-2.04372899067062E-01):d := -3.73738476941494E-01+I*(3.43764412540536E-01):e := 6.19101551593266E-01+I*(-4.99744785624677E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.02711106190308E-02+I*(-2.60696914659059E-01):b := -9.05325179141167E-01+I*(-6.27539722495975E-01):c := -1.11093934632446E-01+I*(-2.94758150394218E-01):d := -3.29384298193342E-01+I*(2.80117971566396E-01):e := 3.77388490318818E-01+I*(-5.28797140195758E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.08358802128710E-01+I*(-3.13312928570837E-01):b := -5.60960714223712E-01+I*(-5.48126625031500E-01):c := -2.72216754719682E-01+I*(-5.47945815234261E-01):d := -2.54495882375392E-01+I*(2.59872285670990E-01):e := 1.97180589174339E-01+I*(-5.75951065405171E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.80317429214777E-01+I*(9.30219909171739E-02):b := -2.32124388524836E-01+I*(-2.80424027891864E-01):c := -5.04146921505718E-02+I*(-9.42238797474044E-01):d := -3.71975219170581E-01+I*(4.99092060650561E-02):e := -3.27700447237120E-01+I*(-7.89360445767920E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.82159990286623E-01+I*(3.67596308131417E-01):b := -2.50532760812402E-01+I*(7.24987066783381E-02):c := 1.70947799062254E-01+I*(-1.14487937649036E+00):d := -3.39032873800584E-01+I*(1.20144272112021E-01):e := -6.43575075340187E-01+I*(-6.18241798356596E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.83682949225259E-01+I*(6.43395574452303E-01):b := -4.91488753068574E-01+I*(3.31020532725251E-01):c := 4.70776158782209E-01+I*(-1.15782199939528E+00):d := -3.58943803407098E-01+I*(1.95122385607242E-01):e := -1.00244897188273E+00+I*(-3.52367182501480E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.30964807993698E-01+I*(7.91370248000872E-01):b := -8.42246378589129E-01+I*(3.74176214691467E-01):c := 7.08777365275283E-01+I*(-9.75010669090346E-01):d := -4.22391462741899E-01+I*(2.39760453957392E-01):e := -1.50514864734250E+00+I*(2.19276394790473E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.22551935234736E-02+I*(7.42281334468437E-01):b := -1.13868224615621E+00+I*(1.81772729363012E-01):c := 7.73588008934591E-01+I*(-6.81984838746869E-01):d := -4.99687986860047E-01+I*(2.33171828884566E-01):e := -1.92910749587462E+00+I*(2.36328547521454E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.47355456924842E-01+I*(5.19098082059330E-01):b := -1.24209071881750E+00+I*(-1.56162194148376E-01):c := 6.34882469301872E-01+I*(-4.15854551001912E-01):d := -5.54665473071484E-01+I*(1.78439401284752E-01):e := 3.70595672636794E+00+I*(1.43616473030251E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.49146212718831E-01+I*(2.26250414981330E-01):b := -1.10408582295760E+00+I*(-4.81505049403394E-01):c := 3.57562609911636E-01+I*(-3.01145125200031E-01):d := -5.61599344571180E-01+I*(1.01173082315078E-01):e := 1.46143647841243E+00+I*(-9.92366484365554E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.77208406795471E-02+I*(7.65011299521531E-04):b := -7.89241583102953E-01+I*(-6.42024298645141E-01):c := 7.13894750395021E-02+I*(-3.91530376527187E-01):d := -5.17245165823028E-01+I*(3.75266413409380E-02):e := 5.06884845340435E-01+I*(-1.03021025915495E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.25808532189226E-01+I*(-5.18510026122572E-02):b := -4.44877118185498E-01+I*(-5.62611201180666E-01):c := -8.97333450477338E-02+I*(-6.44718041367230E-01):d := -4.42356750005077E-01+I*(1.72809554455320E-02):e := 1.90882926340134E-02+I*(-9.23252490401970E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.25620211550607E-01+I*(3.04529916660205E-01):b := -1.33888688762248E-01+I*(-2.16902759740644E-01):c := 1.51579697710085E-01+I*(-8.99072548840977E-01):d := -3.59950291611511E-01+I*(-2.56681172460322E-01):e := -1.21584333432185E+00+I*(-8.88850860023417E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.27462772622453E-01+I*(5.79104233874448E-01):b := -1.52297061049814E-01+I*(1.36019974829558E-01):c := 3.72942188922910E-01+I*(-1.10171312785730E+00):d := -3.27007946241515E-01+I*(-1.86446106413357E-01):e := -1.10613940816269E+00+I*(-1.08117058413784E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.28985731561089E-01+I*(8.54903500195334E-01):b := -3.93253053305987E-01+I*(3.94541800876471E-01):c := 6.72770548642865E-01+I*(-1.11465575076221E+00):d := -3.46918875848028E-01+I*(-1.11467992918136E-01):e := -8.92273192331626E-01+I*(3.44620222475445E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76267590329528E-01+I*(1.00287817374390E+00):b := -7.44010678826542E-01+I*(4.37697482842686E-01):c := 9.10771755135939E-01+I*(-9.31844420457278E-01):d := -4.10366535182830E-01+I*(-6.68299245679863E-02):e := -6.36989863048008E-01+I*(6.76315748294793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12442024140697E-01+I*(9.53789260211468E-01):b := -1.04044654639363E+00+I*(2.45293997514232E-01):c := 9.75582398795247E-01+I*(-6.38818590113802E-01):d := -4.87663059300978E-01+I*(-7.34185496408115E-02):e := -3.02079481664070E-01+I*(9.66361530723260E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02052674589012E-01+I*(7.30606007802360E-01):b := -1.14385501905491E+00+I*(-9.26409259971569E-02):c := 8.36876859162527E-01+I*(-3.72688302368845E-01):d := -5.42640545512415E-01+I*(-1.28150977240626E-01):e := 2.33825521256802E-01+I*(1.23844288180109E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.03843430383001E-01+I*(4.37758340724361E-01):b := -1.00585012319502E+00+I*(-4.17983781252174E-01):c := 5.59556999772291E-01+I*(-2.57978876566963E-01):d := -5.49574417012110E-01+I*(-2.05417296210300E-01):e := 1.34812291096993E+00+I*(1.31211608857675E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16976376984623E-01+I*(2.12272937042552E-01):b := -6.91005883340365E-01+I*(-5.78503030493922E-01):c := 2.73383864900158E-01+I*(-3.48364127894120E-01):d := -5.05220238263959E-01+I*(-2.69063737184440E-01):e := 3.06696290210101E+00+I*(-9.57240835615629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71111314525057E-01+I*(1.59656923130774E-01):b := -3.46641418422910E-01+I*(-4.99089933029447E-01):c := 1.12261044812922E-01+I*(-6.01551792734163E-01):d := -4.30331822446008E-01+I*(-2.89309423079846E-01):e := -4.07882706375415E-01+I*(-2.47134446115227E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71160593574882E-01+I*(3.67116933083765E-01):b := -9.94664609623939E-02+I*(-1.05097954617254E-01):c := 2.78569647826065E-01+I*(-7.36165792916701E-01):d := -1.53666166110759E-01+I*(-4.83813553801084E-01):e := -2.56304096741256E+00+I*(3.07025742189170E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73003154646728E-01+I*(6.41691250298008E-01):b := -1.17874833249960E-01+I*(2.47824779952948E-01):c := 4.99932139038890E-01+I*(-9.38806371933021E-01):d := -1.20723820740763E-01+I*(-4.13578487754119E-01):e := -1.00644757574635E+00+I*(9.61040351681488E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74526113585364E-01+I*(9.17490516618894E-01):b := -3.58830825506132E-01+I*(5.06346605999861E-01):c := 7.99760498758845E-01+I*(-9.51748994837935E-01):d := -1.40634750347276E-01+I*(-3.38600374258898E-01):e := -4.67660429277547E-01+I*(7.49270074104192E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.81920276461968E-02+I*(1.06546519016746E+00):b := -7.09588451026687E-01+I*(5.49502287966076E-01):c := 1.03776170525192E+00+I*(-7.68937664533003E-01):d := -2.04082409682078E-01+I*(-2.93962305908748E-01):e := -1.81029414594978E-01+I*(6.83397819486709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.66901642116422E-01+I*(1.01637627663503E+00):b := -1.00602431859377E+00+I*(3.57098802637622E-01):c := 1.10257234891123E+00+I*(-4.75911834189527E-01):d := -2.81378933800226E-01+I*(-3.00550930981574E-01):e := 3.47035516715305E-02+I*(6.53254381795059E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.56512292564737E-01+I*(7.93193024225921E-01):b := -1.10943279125505E+00+I*(1.91638791262335E-02):c := 9.63866809278508E-01+I*(-2.09781546444570E-01):d := -3.36356420011663E-01+I*(-3.55283358581388E-01):e := 2.45237122027539E-01+I*(6.39359235250991E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.58303048358726E-01+I*(5.00345357147921E-01):b := -9.71427895395161E-01+I*(-3.06178976128784E-01):c := 6.86546949888272E-01+I*(-9.50721206426881E-02):d := -3.43290291511358E-01+I*(-4.32549677551062E-01):e := 5.09990523524212E-01+I*(6.43333089832656E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.71435994960348E-01+I*(2.74859953466112E-01):b := -6.56583655540511E-01+I*(-4.66698225370532E-01):c := 4.00373815016138E-01+I*(-1.85457371969845E-01):d := -2.98936112763206E-01+I*(-4.96196118525202E-01):e := 9.69690359324653E-01+I*(7.07665673062676E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.33483034506686E-02+I*(2.22243939554334E-01):b := -3.12219190623056E-01+I*(-3.87285127906056E-01):c := 2.39250994928902E-01+I*(-4.38645036809888E-01):d := -2.24047696945256E-01+I*(-5.16441804420608E-01):e := 2.34307022898732E+00+I*(1.43170603088115E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.39969414579131E-02+I*(2.51497879626063E-01):b := -1.44964248073273E-01+I*(2.67567658907303E-03):c := 2.71135149202014E-01+I*(-5.29744411305107E-01):d := 1.50354522417190E-01+I*(-5.25210172432649E-01):e := 1.22359629663537E+00+I*(9.67458279656018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78456196139332E-02+I*(5.26072196840306E-01):b := -1.63372620360839E-01+I*(3.55598411159275E-01):c := 4.92497640414840E-01+I*(-7.32384990321427E-01):d := 1.83296867787186E-01+I*(-4.54975106385684E-01):e := 2.79380811705196E-01+I*(1.36755151973692E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.06314214474309E-02+I*(8.01871463161192E-01):b := -4.04328612617012E-01+I*(6.14120237206188E-01):c := 7.92326000134795E-01+I*(-7.45327613226341E-01):d := 1.63385938180673E-01+I*(-3.79996992890463E-01):e := 4.66579915151421E-02+I*(8.54987415824164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13349562678992E-01+I*(9.49846136709760E-01):b := -7.55086238137567E-01+I*(6.57275919172404E-01):c := 1.03032720662787E+00+I*(-5.62516282921409E-01):d := 9.99382788458714E-02+I*(-3.35358924540313E-01):e := 1.17321443509668E-01+I*(6.13283778850439E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.02059177149217E-01+I*(9.00757223177326E-01):b := -1.05152210570465E+00+I*(4.64872433843949E-01):c := 1.09513785028718E+00+I*(-2.69490452577933E-01):d := 2.26417547277236E-02+I*(-3.41947549613139E-01):e := 2.09387393657958E-01+I*(4.87352283255228E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.91669827597532E-01+I*(6.77573970768218E-01):b := -1.15493057836593E+00+I*(1.26937510332561E-01):c := 9.56432310654457E-01+I*(-3.36016483297513E-03):d := -3.23357314837134E-02+I*(-3.96679977212953E-01):e := 3.06562729915278E-01+I*(4.05564554627567E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.93460583391521E-01+I*(3.84726303690219E-01):b := -1.01692568250604E+00+I*(-1.98405344922456E-01):c := 6.79112451264221E-01+I*(1.11349260968906E-01):d := -3.92696029834087E-02+I*(-4.73946296182627E-01):e := 4.22315663950430E-01+I*(3.45099421417190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.06593529993143E-01+I*(1.59240900008410E-01):b := -7.02081442651390E-01+I*(-3.58924594164204E-01):c := 3.92939316392087E-01+I*(2.09640096417498E-02):d := 5.08457576474297E-03+I*(-5.37592737156767E-01):e := 5.88459189360766E-01+I*(3.06884691719335E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.18505838483463E-01+I*(1.06624886096632E-01):b := -3.57716977733935E-01+I*(-2.79511496699729E-01):c := 2.31816496304852E-01+I*(-2.32223655198293E-01):d := 7.99729915826933E-02+I*(-5.57838423052173E-01):e := 8.81413727688594E-01+I*(3.58001561225755E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.69819569421045E-01+I*(1.17721963626054E-02):b := -2.49093129854126E-01+I*(5.59896540664050E-02):c := 1.32754886369374E-01+I*(-3.76395262580374E-01):d := 4.09857114996520E-01+I*(-3.61501090425139E-01):e := 8.63854251607761E-01+I*(9.74317792425808E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.79770083491991E-02+I*(2.86346513576849E-01):b := -2.67501502141692E-01+I*(4.08912388636607E-01):c := 3.54117377582200E-01+I*(-5.79035841596694E-01):d := 4.42799460366516E-01+I*(-2.91266024378173E-01):e := 9.77396830157830E-01+I*(5.40410645736987E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.66454049410563E-01+I*(5.62145779897735E-01):b := -5.08457494397865E-01+I*(6.67434214683520E-01):c := 6.53945737302155E-01+I*(-5.91978464501608E-01):d := 4.22888530760003E-01+I*(-2.16287910882953E-01):e := 5.41079213760388E-01+I*(6.89936126997668E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.19172190642124E-01+I*(7.10120453446303E-01):b := -8.59215119918420E-01+I*(7.10589896649735E-01):c := 8.91946943795229E-01+I*(-4.09167134196676E-01):d := 3.59440871425201E-01+I*(-1.71649842532803E-01):e := 3.63794477129748E-01+I*(5.04201143240436E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.07881805112349E-01+I*(6.61031539913869E-01):b := -1.15565098748550E+00+I*(5.18186411321281E-01):c := 9.56757587454537E-01+I*(-1.16141303853200E-01):d := 2.82144347307053E-01+I*(-1.78238467605628E-01):e := 3.41127517400921E-01+I*(3.60613683031804E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.97492455560663E-01+I*(4.37848287504762E-01):b := -1.25905946014679E+00+I*(1.80251487809893E-01):c := 8.18052047821817E-01+I*(1.49988983891757E-01):d := 2.27166861095616E-01+I*(-2.32970895205443E-01):e := 3.63333337787770E-01+I*(2.58720862820580E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.99283211354653E-01+I*(1.45000620426761E-01):b := -1.12105456428689E+00+I*(-1.45091367445125E-01):c := 5.40732188431581E-01+I*(2.64698409693639E-01):d := 2.20232989595921E-01+I*(-3.10237214175117E-01):e := 4.08859343347764E-01+I*(1.76946388816053E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.12416157956275E-01+I*(-8.04847832550468E-02):b := -8.06210324432243E-01+I*(-3.05610616686872E-01):c := 2.54559053559448E-01+I*(1.74313158366482E-01):d := 2.64587168344073E-01+I*(-3.73883655149256E-01):e := 4.83349492040016E-01+I*(1.04693844572356E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.24328466446596E-01+I*(-1.33100797166826E-01):b := -4.61845859514789E-01+I*(-2.26197519222397E-01):c := 9.34362334722124E-02+I*(-7.88745064735605E-02):d := 3.39475584162023E-01+I*(-3.94129341044663E-01):e := 6.15752479041880E-01+I*(4.83990073395454E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.67917066030597E-02+I*(-2.39889805253436E-01):b := -3.63130045256078E-01+I*(2.98977752342387E-02):c := -7.18214777671489E-02+I*(-3.47872117716755E-01):d := 5.03417464509298E-01+I*(-6.92876066736487E-02):e := 6.15742676270811E-01+I*(-2.05874072245801E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.05085446878662E-03+I*(3.46845119608074E-02):b := -3.81538417543644E-01+I*(3.82820509804441E-01):c := 1.49541013445677E-01+I*(-5.50512696733074E-01):d := 5.36359809879294E-01+I*(9.47459373316540E-04):e := 8.83358085809902E-01+I*(-1.47655174263827E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.34261865925774E-02+I*(3.10483778281693E-01):b := -6.22494409799817E-01+I*(6.41342335851354E-01):c := 4.49369373165632E-01+I*(-5.63455319637989E-01):d := 5.16448880272781E-01+I*(7.59255728685371E-02):e := 9.10477948007592E-01+I*(2.49669260734642E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.46144327824138E-01+I*(4.58458451830262E-01):b := -9.73252035320372E-01+I*(6.84498017817569E-01):c := 6.87370579658705E-01+I*(-3.80643989333057E-01):d := 4.53001220937980E-01+I*(1.20563641218687E-01):e := 6.12104006545920E-01+I*(3.34055030102151E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.34853942294363E-01+I*(4.09369538297827E-01):b := -1.26968790288746E+00+I*(4.92094532489115E-01):c := 7.52181223318014E-01+I*(-8.76181589895802E-02):d := 3.75704696819831E-01+I*(1.13975016145862E-01):e := 4.71094238539721E-01+I*(2.34190730801837E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.24464592742678E-01+I*(1.86186285888720E-01):b := -1.37309637554874E+00+I*(1.54159608977726E-01):c := 6.13475683685294E-01+I*(1.78512128755377E-01):d := 3.20727210608394E-01+I*(5.92425885460471E-02):e := 4.23436549528442E-01+I*(1.34916783171882E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.26255348536667E-01+I*(-1.06661381189280E-01):b := -1.23509147968885E+00+I*(-1.71183246277291E-01):c := 3.36155824295058E-01+I*(2.93221554557259E-01):d := 3.13793339108699E-01+I*(-1.80237304236270E-02):e := 4.15056712703696E-01+I*(4.78647638747881E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.39388295138289E-01+I*(-3.32146784871088E-01):b := -9.20247239834195E-01+I*(-3.31702495519039E-01):c := 4.99826894229247E-02+I*(2.02836303230102E-01):d := 3.58147517856851E-01+I*(-8.16701713977668E-02):e := 4.32994898247690E-01+I*(-3.57297595426009E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.51300603628610E-01+I*(-3.84762798782867E-01):b := -5.75882774916740E-01+I*(-2.52289398054563E-01):c := -1.11140130664311E-01+I*(-5.03513616099407E-02):d := 4.33035933674802E-01+I*(-1.01915857293173E-01):e := 4.86315796800594E-01+I*(-1.23472812214282E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20916098369219E-01+I*(-3.85732677754314E-01):b := -4.33715854183413E-01+I*(-6.33912798229228E-02):c := -2.46870388815046E-01+I*(-4.57521273195380E-01):d := 3.87257643611035E-01+I*(2.14700342183374E-01):e := 4.26182633172753E-01+I*(-3.79956695173935E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.22758659441065E-01+I*(-1.11158360540071E-01):b := -4.52124226470979E-01+I*(2.89531454747279E-01):c := -2.55078976022209E-02+I*(-6.60161852211700E-01):d := 4.20199988981031E-01+I*(2.84935408230339E-01):e := 5.77933798364437E-01+I*(-5.25105285226891E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.24281618379701E-01+I*(1.64640905780815E-01):b := -6.93080218727152E-01+I*(5.48053280794193E-01):c := 2.74320462117734E-01+I*(-6.73104475116614E-01):d := 4.00289059374518E-01+I*(3.59913521725560E-01):e := 9.52720116360010E-01+I*(-4.35707871829939E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28436522851860E-01+I*(3.12615579329383E-01):b := -1.04383784424771E+00+I*(5.91208962760408E-01):c := 5.12321668610808E-01+I*(-4.90293144811682E-01):d := 3.36841400039716E-01+I*(4.04551590075709E-01):e := 9.04621385127878E-01+I*(8.07926566726159E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.17146137322085E-01+I*(2.63526665796949E-01):b := -1.34027371181479E+00+I*(3.98805477431953E-01):c := 5.77132312270116E-01+I*(-1.97267314468206E-01):d := 2.59544875921569E-01+I*(3.97962965002884E-01):e := 6.38125482405708E-01+I*(6.96497669098959E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.06756787770400E-01+I*(4.03434133878415E-02):b := -1.44368218447607E+00+I*(6.08705539205653E-02):c := 4.38426772637396E-01+I*(6.88629732767511E-02):d := 2.04567389710132E-01+I*(3.43230537403070E-01):e := 5.02374556072848E-01+I*(1.51645085870354E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.08547543564389E-01+I*(-2.52504253690159E-01):b := -1.30567728861618E+00+I*(-2.64472301334453E-01):c := 1.61106913247160E-01+I*(1.83572399078633E-01):d := 1.97633518210436E-01+I*(2.65964218433396E-01):e := 4.35306468798800E-01+I*(-7.88540343058543E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.21680490166011E-01+I*(-4.77989657371967E-01):b := -9.90833048761530E-01+I*(-4.24991550576200E-01):c := -1.25066221624973E-01+I*(9.31871477514766E-02):d := 2.41987696958588E-01+I*(2.02317777459256E-01):e := 4.01424183398587E-01+I*(-1.62486869147282E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.33592798656332E-01+I*(-5.30605671283746E-01):b := -6.46468583844076E-01+I*(-3.45578453111725E-01):c := -2.86189041712209E-01+I*(-1.60000517088566E-01):d := 3.16876112776538E-01+I*(1.82072091563850E-01):e := 3.92943796922221E-01+I*(-2.57992254457288E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.81435943996521E-01+I*(-3.57514920233888E-01):b := -4.27822672165148E-01+I*(-1.80226525451474E-01):c := -3.10484515843063E-01+I*(-6.54036670553180E-01):d := 1.15730123472636E-01+I*(3.57581638701242E-01):e := 2.44708622246708E-01+I*(-5.14233710388528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.83278505068367E-01+I*(-8.29406030196446E-02):b := -4.46231044452713E-01+I*(1.72696209118728E-01):c := -8.91220246302378E-02+I*(-8.56677249569500E-01):d := 1.48672468842632E-01+I*(4.27816704748207E-01):e := 2.19754706590062E-01+I*(-7.12726623568408E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.84801464007003E-01+I*(1.92858663301241E-01):b := -6.87187036708886E-01+I*(4.31218035165641E-01):c := 2.10706335089717E-01+I*(-8.69619872474414E-01):d := 1.28761539236119E-01+I*(5.02794818243427E-01):e := 4.11068283205265E-01+I*(-1.06527745156415E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32083322775443E-01+I*(3.40833336849810E-01):b := -1.03794466222944E+00+I*(4.74373717131856E-01):c := 4.48707541582791E-01+I*(-6.86808542169482E-01):d := 6.53138799013175E-02+I*(5.47432886593577E-01):e := 1.16676546549722E+00+I*(-8.66143691836377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.56626291694782E-01+I*(2.91744423317376E-01):b := -1.33438052979653E+00+I*(2.81970231803402E-01):c := 5.13518185242099E-01+I*(-3.93782711826006E-01):d := -1.19826442168305E-02+I*(5.40844261520752E-01):e := 9.44162723755488E-01+I*(-2.38004331720963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.46236942143098E-01+I*(6.85611709082682E-02):b := -1.43778900245781E+00+I*(-5.59646917079862E-02):c := 3.74812645609380E-01+I*(-1.27652424081049E-01):d := -6.69601304282677E-02+I*(4.86111833920937E-01):e := 6.42264510053001E-01+I*(-1.84966140312263E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.48027697937086E-01+I*(-2.24286496169731E-01):b := -1.29978410659791E+00+I*(-3.81307546963004E-01):c := 9.74927862191439E-02+I*(-1.29429982791667E-02):d := -7.38940019279629E-02+I*(4.08845514951263E-01):e := 4.81539154242702E-01+I*(-2.37095626465071E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.61160644538709E-01+I*(-4.49771899851540E-01):b := -9.84939866743264E-01+I*(-5.41826796204751E-01):c := -1.88680348652989E-01+I*(-1.03328249606323E-01):d := -2.95398231798111E-02+I*(3.45199073977124E-01):e := 3.80219115928100E-01+I*(-3.08088681195119E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.26927046970971E-01+I*(-5.02387913763319E-01):b := -6.40575401825810E-01+I*(-4.62413698740276E-01):c := -3.49803168740225E-01+I*(-3.56515914446366E-01):d := 4.53485926381393E-02+I*(3.24953388081717E-01):e := 3.04667284007161E-01+I*(-3.94688349362087E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.13432844962233E-01+I*(-1.42338091843904E-01):b := -4.48721448565526E-01+I*(-5.06847324307560E-01):c := 2.23374456666416E-01+I*(-7.56984077848979E-01):d := -4.01197618570400E-01+I*(2.14633385522284E-01):e := -2.56084172206225E-01+I*(-4.79475488110222E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.15275406034080E-01+I*(1.32236225370339E-01):b := -4.67129820853091E-01+I*(-1.53924589737358E-01):c := 4.44736947879241E-01+I*(-9.59624656865299E-01):d := -3.68255273200404E-01+I*(2.84868451569249E-01):e := -3.78252819390041E-01+I*(-4.06705038450241E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.16798364972716E-01+I*(4.08035491691225E-01):b := -7.08085813109264E-01+I*(1.04597236309556E-01):c := 7.44565307599196E-01+I*(-9.72567279770214E-01):d := -3.88166202806917E-01+I*(3.59846565064470E-01):e := -5.36291434497545E-01+I*(-3.50785452053700E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64080223741155E-01+I*(5.56010165239793E-01):b := -1.05884343862982E+00+I*(1.47752918275771E-01):c := 9.82566514092270E-01+I*(-7.89755949465282E-01):d := -4.51613862141719E-01+I*(4.04484633414620E-01):e := -7.96238732717296E-01+I*(-3.33303995054870E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.53706092709301E-02+I*(5.06921251707359E-01):b := -1.35527930619690E+00+I*(-4.46505670526835E-02):c := 1.04737715775158E+00+I*(-4.96730119121805E-01):d := -5.28910386259867E-01+I*(3.97896008341795E-01):e := -1.31899183000751E+00+I*(-6.07817860581322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.14240041177386E-01+I*(2.83737999298251E-01):b := -1.45868777885819E+00+I*(-3.82585490564072E-01):c := 9.08671618118859E-01+I*(-2.30599831376848E-01):d := -5.83887872471304E-01+I*(3.43163580741980E-01):e := -7.73344591782201E-01+I*(-1.90185631895095E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16030796971374E-01+I*(-9.10966777974833E-03):b := -1.32068288299829E+00+I*(-7.07928345819089E-01):c := 6.31351758728622E-01+I*(-1.15890405574966E-01):d := -5.90821743970999E-01+I*(2.65897261772306E-01):e := 6.76896847213650E-02+I*(-1.15867331099481E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.08362564270040E-02+I*(-2.34595071461557E-01):b := -1.00583864314364E+00+I*(-8.68447595060837E-01):c := 3.45178623856489E-01+I*(-2.06275656902123E-01):d := -5.46467565222847E-01+I*(2.02250820798166E-01):e := -1.91458673963392E-02+I*(-7.55027752936774E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.58923947936683E-01+I*(-2.87211085373336E-01):b := -6.61474178226188E-01+I*(-7.89034497596362E-01):c := 1.84055803769253E-01+I*(-4.59463321742166E-01):d := -4.71579149404897E-01+I*(1.82005134902760E-01):e := -1.41495431160854E-01+I*(-5.81009477171046E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.30882575022750E-01+I*(1.19123834114676E-01):b := -3.32637852527311E-01+I*(-5.21331900456726E-01):c := 4.05857866338363E-01+I*(-8.53756303981949E-01):d := -5.89058486200086E-01+I*(-2.79579447031734E-02):e := -4.27465231686477E-01+I*(-3.57562012828447E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.32725136094596E-01+I*(3.93698151328919E-01):b := -3.51046224814877E-01+I*(-1.68409165886524E-01):c := 6.27220357551189E-01+I*(-1.05639688299827E+00):d := -5.56116140830090E-01+I*(4.22771213437919E-02):e := -4.65313053869943E-01+I*(-2.27037366623009E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.34248095033232E-01+I*(6.69497417649805E-01):b := -5.92002217071050E-01+I*(9.01126601603893E-02):c := 9.27048717271144E-01+I*(-1.06933950590318E+00):d := -5.76027070436603E-01+I*(1.17255234839012E-01):e := -5.27343951300486E-01+I*(-1.11173331659117E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.81529953801672E-01+I*(8.17472091198373E-01):b := -9.42759842591604E-01+I*(1.33268342126605E-01):c := 1.16504992376422E+00+I*(-8.86528175598251E-01):d := -6.39474729771405E-01+I*(1.61893303189162E-01):e := -6.33435358809088E-01+I*(9.67427861748573E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.28203393314467E-02+I*(7.68383177665939E-01):b := -1.23919571015869E+00+I*(-5.91351432018500E-02):c := 1.22986056742353E+00+I*(-5.93502345254774E-01):d := -7.16771253889553E-01+I*(1.55304678116337E-01):e := -8.58648550069664E-01+I*(1.38638480489570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.67903111168684E-02+I*(5.45199925256832E-01):b := -1.34260418281997E+00+I*(-3.97070066713237E-01):c := 1.09115502779081E+00+I*(-3.27372057509818E-01):d := -7.71748740100990E-01+I*(1.00572250516523E-01):e := -1.44147433977390E+00+I*(4.20954393207010E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.85810669108577E-02+I*(2.52352258178832E-01):b := -1.20459928696008E+00+I*(-7.22412921968255E-01):c := 8.13835168400570E-01+I*(-2.12662631707935E-01):d := -7.78682611600685E-01+I*(2.33059315468481E-02):e := -1.26862686554060E+00+I*(-1.07327462341902E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.82859864875205E-02+I*(2.68668544970234E-02):b := -8.89755047105428E-01+I*(-8.82932171210003E-01):c := 5.27662033528437E-01+I*(-3.03047883035092E-01):d := -7.34328432852533E-01+I*(-4.03405094272916E-02):e := -5.31913787997607E-01+I*(-8.34399641631448E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.76373677997200E-01+I*(-2.57491594147555E-02):b := -5.45390582187973E-01+I*(-8.03519073745528E-01):c := 3.66539213441201E-01+I*(-5.56235547875135E-01):d := -6.59440017034583E-01+I*(-6.05861953226977E-02):e := -4.21124222055686E-01+I*(-5.36468809151967E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.76185357358580E-01+I*(3.30631759857706E-01):b := -2.34402152764724E-01+I*(-4.57810632305506E-01):c := 6.07852256199019E-01+I*(-8.10590055348881E-01):d := -5.77033558641016E-01+I*(-3.34548323228551E-01):e := -6.21154183074848E-01+I*(-1.96276098682936E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.78027918430426E-01+I*(6.05206077071950E-01):b := -2.52810525052290E-01+I*(-1.04887897735304E-01):c := 8.29214747411845E-01+I*(-1.01323063436520E+00):d := -5.44091213271020E-01+I*(-2.64313257181586E-01):e := -5.44376619055938E-01+I*(-4.72352838887457E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.79550877369062E-01+I*(8.81005343392836E-01):b := -4.93766517308462E-01+I*(1.53633928311609E-01):c := 1.12904310713180E+00+I*(-1.02617325727012E+00):d := -5.64002142877534E-01+I*(-1.89335143686366E-01):e := -5.12241929464829E-01+I*(8.23666938833996E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26832736137501E-01+I*(1.02898001694140E+00):b := -8.44524142829017E-01+I*(1.96789610277825E-01):c := 1.36704431362487E+00+I*(-8.43361926965184E-01):d := -6.27449802212335E-01+I*(-1.44697075336216E-01):e := -5.07408753996481E-01+I*(2.17150521838240E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.18768783327236E-02+I*(9.79891103408969E-01):b := -1.14096001039610E+00+I*(4.38612494936969E-03):c := 1.43185495728418E+00+I*(-5.50336096621707E-01):d := -7.04746326330483E-01+I*(-1.51285700409041E-01):e := -5.42157071637360E-01+I*(3.86748325221873E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.51487528781039E-01+I*(7.56707850999862E-01):b := -1.24436848305738E+00+I*(-3.33548798562019E-01):c := 1.29314941765146E+00+I*(-2.84205808876750E-01):d := -7.59723812541920E-01+I*(-2.06018128008855E-01):e := -7.01974135836341E-01+I*(6.37633819626997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.53278284575028E-01+I*(4.63860183921862E-01):b := -1.10636358719749E+00+I*(-6.58891653817036E-01):c := 1.01582955826123E+00+I*(-1.69496383074868E-01):d := -7.66657684041616E-01+I*(-2.83284446978530E-01):e := -1.40549420476410E+00+I*(7.71284973132924E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.64112311766495E-02+I*(2.38374780240054E-01):b := -7.91519347342840E-01+I*(-8.19410903058783E-01):c := 7.29656423389093E-01+I*(-2.59881634402024E-01):d := -7.22303505293464E-01+I*(-3.46930887952669E-01):e := -1.48593887116098E+00+I*(-3.85028345624722E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21676460333030E-01+I*(1.85758766328275E-01):b := -4.47154882425386E-01+I*(-7.39997805594308E-01):c := 5.68533603301857E-01+I*(-5.13069299242068E-01):d := -6.47415089475514E-01+I*(-3.67176573848076E-01):e := -8.26330538249182E-01+I*(-3.86698179379888E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21725739382855E-01+I*(3.93218776281267E-01):b := -1.99979924964869E-01+I*(-3.46005827182116E-01):c := 7.34842206315000E-01+I*(-6.47683299424606E-01):d := -3.70749433140264E-01+I*(-5.61680704569314E-01):e := -9.07855337532398E-01+I*(1.01192235327508E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23568300454701E-01+I*(6.67793093495510E-01):b := -2.18388297252435E-01+I*(6.91690738808646E-03):c := 9.56204697527825E-01+I*(-8.50323878440926E-01):d := -3.37807087770268E-01+I*(-4.91445638522348E-01):e := -6.35890149439337E-01+I*(1.86969444128796E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.25091259393337E-01+I*(9.43592359816396E-01):b := -4.59344289508608E-01+I*(2.65438733434999E-01):c := 1.25603305724778E+00+I*(-8.63266501345840E-01):d := -3.57718017376782E-01+I*(-4.16467525027128E-01):e := -4.88845807091388E-01+I*(2.84811102217531E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.76268818382243E-02+I*(1.09156703336496E+00):b := -8.10101915029163E-01+I*(3.08594415401215E-01):c := 1.49403426374085E+00+I*(-6.80455171040908E-01):d := -4.21165676711583E-01+I*(-3.71829456676978E-01):e := -3.85601704240573E-01+I*(3.87607564393931E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.16336496308449E-01+I*(1.04247811983253E+00):b := -1.10653778259625E+00+I*(1.16190930072761E-01):c := 1.55884490740016E+00+I*(-3.87429340697432E-01):d := -4.98462200829731E-01+I*(-3.78418081749803E-01):e := -2.98514578731260E-01+I*(5.13294221565506E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.05947146756764E-01+I*(8.19294867423422E-01):b := -1.20994625525753E+00+I*(-2.21743993438628E-01):c := 1.42013936776744E+00+I*(-1.21299052952474E-01):d := -5.53439687041168E-01+I*(-4.33150509349618E-01):e := -2.20562389223221E-01+I*(7.04461868675097E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.07737902550753E-01+I*(5.26447200345423E-01):b := -1.07194135939764E+00+I*(-5.47086848693645E-01):c := 1.14281950837721E+00+I*(-6.58962715059295E-03):d := -5.60373558540863E-01+I*(-5.10416828319292E-01):e := -2.11043252878681E-01+I*(1.09054417059763E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.20870849152375E-01+I*(3.00961796663614E-01):b := -7.57097119542986E-01+I*(-7.07606097935393E-01):c := 8.56646373505073E-01+I*(-9.69748784777494E-02):d := -5.16019379792711E-01+I*(-5.74063269293432E-01):e := -1.05453199256346E+00+I*(1.73944152607024E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27831576426956E-02+I*(2.48345782751835E-01):b := -4.12732654625531E-01+I*(-6.28193000470918E-01):c := 6.95523553417837E-01+I*(-3.50162543317792E-01):d := -4.41130963974761E-01+I*(-5.94308955188838E-01):e := -1.56245340541147E+00+I*(3.01897290706923E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.34317956499401E-02+I*(2.77599722823564E-01):b := -2.45477712075749E-01+I*(-2.38232195975788E-01):c := 7.27407707690949E-01+I*(-4.41261917813012E-01):d := -6.67287446123152E-02+I*(-6.03077323200878E-01):e := -1.47830771762410E+00+I*(1.13758261194123E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.84107654219062E-02+I*(5.52174040037807E-01):b := -2.63886084363315E-01+I*(1.14690538594414E-01):c := 9.48770198903774E-01+I*(-6.43902496829331E-01):d := -3.37863992423191E-02+I*(-5.32842257153913E-01):e := -7.73750768217056E-01+I*(6.22737362896013E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00662756394576E-02+I*(8.27973306358693E-01):b := -5.04842076619487E-01+I*(3.73212364641327E-01):c := 1.24859855862373E+00+I*(-6.56845119734246E-01):d := -5.36973288488325E-02+I*(-4.57864143658693E-01):e := -4.43879426818130E-01+I*(5.62721749149350E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.62784416871019E-01+I*(9.75947979907262E-01):b := -8.55599702140042E-01+I*(4.16368046607542E-01):c := 1.48659976511680E+00+I*(-4.74033789429314E-01):d := -1.17144988183634E-01+I*(-4.13226075308542E-01):e := -2.36548396472427E-01+I*(5.66936432191966E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.51494031341243E-01+I*(9.26859066374828E-01):b := -1.15203556970713E+00+I*(2.23964561279087E-01):c := 1.55141040877611E+00+I*(-1.81007959085838E-01):d := -1.94441512301782E-01+I*(-4.19814700381368E-01):e := -6.56843977487435E-02+I*(5.94615100244091E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.41104681789558E-01+I*(7.03675813965720E-01):b := -1.25544404236841E+00+I*(-1.13970362232301E-01):c := 1.41270486914339E+00+I*(8.51223286591195E-02):d := -2.49418998513219E-01+I*(-4.74547127981182E-01):e := 1.11736812860165E-01+I*(6.48085376299364E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.42895437583548E-01+I*(4.10828146887720E-01):b := -1.11743914650852E+00+I*(-4.39313217487318E-01):c := 1.13538500975316E+00+I*(1.99831754461002E-01):d := -2.56352870012914E-01+I*(-5.51813446950856E-01):e := 3.44288379349432E-01+I*(7.62326110805836E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.56028384185169E-01+I*(1.85342743205912E-01):b := -8.02594906653865E-01+I*(-5.99832466729066E-01):c := 8.49211874881022E-01+I*(1.09446503133845E-01):d := -2.11998691264763E-01+I*(-6.15459887924996E-01):e := 7.30825869321388E-01+I*(1.12071736606318E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.67940692675490E-01+I*(1.32726729294133E-01):b := -4.58230441736411E-01+I*(-5.20419369264591E-01):c := 6.88089054793786E-01+I*(-1.43741161706198E-01):d := -1.37110275446812E-01+I*(-6.35705573820402E-01):e := 4.28425006024156E-01+I*(3.01718773891662E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19254423613072E-01+I*(3.78740395601070E-02):b := -3.49606593856602E-01+I*(-1.84918218498457E-01):c := 5.89027444858309E-01+I*(-2.87912769088279E-01):d := 1.92773847967015E-01+I*(-4.39368241193368E-01):e := 4.32762841113558E+00+I*(1.17075120984057E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.74118625412262E-02+I*(3.12448356774350E-01):b := -3.68014966144168E-01+I*(1.68004516071746E-01):c := 8.10389936071135E-01+I*(-4.90553348104599E-01):d := 2.25716193337011E-01+I*(-3.69133175146403E-01):e := -9.46945903263315E-01+I*(2.38153339337212E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15888903602590E-01+I*(5.88247623095236E-01):b := -6.08970958400340E-01+I*(4.26526342118659E-01):c := 1.11021829579109E+00+I*(-5.03495971009513E-01):d := 2.05805263730497E-01+I*(-2.94155061651182E-01):e := -3.05208447177527E-01+I*(1.12685970353498E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.68607044834151E-01+I*(7.36222296643805E-01):b := -9.59728583920895E-01+I*(4.69682024084874E-01):c := 1.34821950228416E+00+I*(-3.20684640704581E-01):d := 1.42357604395696E-01+I*(-2.49516993301032E-01):e := 8.76995620827982E-03+I*(8.10516331763670E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.57316659304376E-01+I*(6.87133383111370E-01):b := -1.25616445148798E+00+I*(2.77278538756419E-01):c := 1.41303014594347E+00+I*(-2.76588103611049E-02):d := 6.50610802775480E-02+I*(-2.56105618373857E-01):e := 2.12549846477994E-01+I*(6.48293989140326E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.46927309752691E-01+I*(4.63950130702262E-01):b := -1.35957292414926E+00+I*(-6.06563847549695E-02):c := 1.27432460631075E+00+I*(2.38471477383853E-01):d := 1.00835940661110E-02+I*(-3.10838045973672E-01):e := 3.87347641239520E-01+I*(5.30143523028427E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.48718065546680E-01+I*(1.71102463624263E-01):b := -1.22156802828937E+00+I*(-3.85999240009986E-01):c := 9.97004746920517E-01+I*(3.53180903185734E-01):d := 3.14972256641567E-03+I*(-3.88104364943346E-01):e := 5.78923170937782E-01+I*(4.19705130306548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.61851012148302E-01+I*(-5.43829400575455E-02):b := -9.06723788434719E-01+I*(-5.46518489251734E-01):c := 7.10831612048383E-01+I*(2.62795651858577E-01):d := 4.75039013145674E-02+I*(-4.51750805917486E-01):e := 8.54519778281518E-01+I*(2.91270800270491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.73763320638623E-01+I*(-1.06998953969324E-01):b := -5.62359323517264E-01+I*(-4.67105391787259E-01):c := 5.49708791961147E-01+I*(9.60798701853466E-03):d := 1.22392317132518E-01+I*(-4.71996491812892E-01):e := 1.44736286568251E+00+I*(1.18506576636777E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.62265607950867E-02+I*(-2.13787962055934E-01):b := -4.63643509258554E-01+I*(-2.11010097330623E-01):c := 3.84451080721786E-01+I*(-2.59389624224660E-01):d := 2.86334197479793E-01+I*(-1.47154757441878E-01):e := 8.93309699843772E-01+I*(-9.37000451203086E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.56160002767596E-02+I*(6.07863551583090E-02):b := -4.82051881546120E-01+I*(1.41912637239579E-01):c := 6.05813571934612E-01+I*(-4.62030203240979E-01):d := 3.19276542849789E-01+I*(-7.69196913949131E-02):e := 1.82638722076449E+00+I*(-2.68129607211783E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.28610407846043E-02+I*(3.36585621479195E-01):b := -7.23007873802292E-01+I*(4.00434463286492E-01):c := 9.05641931654566E-01+I*(-4.74972826145894E-01):d := 2.99365613243276E-01+I*(-1.94157789969285E-03):e := 1.78063179404475E+00+I*(3.97740620189483E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.95579182016165E-01+I*(4.84560295027764E-01):b := -1.07376549932285E+00+I*(4.43590145252708E-01):c := 1.14364313814764E+00+I*(-2.92161495840962E-01):d := 2.35917953908474E-01+I*(4.26964904504571E-02):e := 6.76389621202121E-01+I*(1.25924826235005E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.84288796486390E-01+I*(4.35471381495329E-01):b := -1.37020136688993E+00+I*(2.51186659924253E-01):c := 1.20845378180695E+00+I*(8.64334502515051E-04):d := 1.58621429790327E-01+I*(3.61078653776319E-02):e := 6.44771858110450E-01+I*(6.45713173542261E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.73899446934705E-01+I*(2.12288129086221E-01):b := -1.47360983955121E+00+I*(-8.67482635871354E-02):c := 1.06974824217423E+00+I*(2.66994622247472E-01):d := 1.03643943578889E-01+I*(-1.86245622221826E-02):e := 6.55897036535362E-01+I*(3.30285426437120E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.75690202728695E-01+I*(-8.05595379917779E-02):b := -1.33560494369132E+00+I*(-4.12091118842152E-01):c := 7.92428382783993E-01+I*(3.81704048049354E-01):d := 9.67100720791941E-02+I*(-9.58908811918564E-02):e := 6.76356572597376E-01+I*(9.49380315646222E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.88823149330316E-01+I*(-3.06044941673587E-01):b := -1.02076070383667E+00+I*(-5.72610368083900E-01):c := 5.06255247911860E-01+I*(2.91318796722197E-01):d := 1.41064250827346E-01+I*(-1.59537322165996E-01):e := 7.06415519549884E-01+I*(-1.34422931067650E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.00735457820637E-01+I*(-3.58660955585365E-01):b := -6.76396238919216E-01+I*(-4.93197270619425E-01):c := 3.45132427824624E-01+I*(3.81311318821544E-02):d := 2.15952666645296E-01+I*(-1.79783008061402E-01):e := 7.58943522366319E-01+I*(-4.24170440513791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71481244177192E-01+I*(-3.59630834556813E-01):b := -5.34229318185889E-01+I*(-3.04299152387784E-01):c := 2.09402169673889E-01+I*(-3.69038779703285E-01):d := 1.70174376581530E-01+I*(1.36833191415145E-01):e := 2.26981895312887E-01+I*(-7.39243486852817E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73323805249038E-01+I*(-8.50565173425695E-02):b := -5.52637690473455E-01+I*(4.86235821824178E-02):c := 4.30764660886714E-01+I*(-5.71679358719605E-01):d := 2.03116721951526E-01+I*(2.07068257462110E-01):e := 2.31190197772053E-02+I*(-1.07261873133891E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74846764187674E-01+I*(1.90742748978316E-01):b := -7.93593682729627E-01+I*(3.07145408229331E-01):c := 7.30593020606669E-01+I*(-5.84621981624519E-01):d := 1.83205792345013E-01+I*(2.82046370957330E-01):e := -2.68486733600282E-01+I*(-2.10400866387667E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.78713770438866E-02+I*(3.38717422526885E-01):b := -1.14435130825018E+00+I*(3.50301090195546E-01):c := 9.68594227099742E-01+I*(-4.01810651319587E-01):d := 1.19758133010211E-01+I*(3.26684439307480E-01):e := 5.03992228589134E+00+I*(-1.72542613239609E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.66580991514111E-01+I*(2.89628508994451E-01):b := -1.44078717581727E+00+I*(1.57897604867092E-01):c := 1.03340487075905E+00+I*(-1.08784820976111E-01):d := 4.24616088920630E-02+I*(3.20095814234655E-01):e := 1.57115375557739E+00+I*(2.48888071301421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.56191641962427E-01+I*(6.64452565853428E-02):b := -1.54419564847855E+00+I*(-1.80037318644297E-01):c := 8.94699331126331E-01+I*(1.57345466768846E-01):d := -1.25158773193742E-02+I*(2.65363386634841E-01):e := 9.37456116247918E-01+I*(-5.70396745012077E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.57982397756416E-01+I*(-2.26402410492656E-01):b := -1.40619075261866E+00+I*(-5.05380173899314E-01):c := 6.17379471736096E-01+I*(2.72054892570728E-01):d := -1.94497488190694E-02+I*(1.88097067665167E-01):e := 6.80507302428034E-01+I*(-2.48576583976827E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.71115344358037E-01+I*(-4.51887814174465E-01):b := -1.09134651276401E+00+I*(-6.65899423141062E-01):c := 3.31206336863962E-01+I*(1.81669641243572E-01):d := 2.49044299290822E-02+I*(1.24450626691026E-01):e := 5.16320411075800E-01+I*(-3.98971992599181E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.30276528483585E-02+I*(-5.04503828086244E-01):b := -7.46982047846551E-01+I*(-5.86486325676587E-01):c := 1.70083516776726E-01+I*(-7.15180235964713E-02):d := 9.97928457470328E-02+I*(1.04204940795620E-01):e := 3.76904154246315E-01+I*(-5.48695314990049E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.32001089804494E-01+I*(-3.31413077036386E-01):b := -5.28336136167623E-01+I*(-4.21134398016336E-01):c := 1.45788042645872E-01+I*(-5.65554177061084E-01):d := -1.01353143556869E-01+I*(2.79714487933012E-01):e := -6.24606438519525E-02+I*(-5.97239293591980E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.33843650876340E-01+I*(-5.68387598221428E-02):b := -5.46744508455189E-01+I*(-6.82116634461335E-02):c := 3.67150533858697E-01+I*(-7.68194756077404E-01):d := -6.84107981868730E-02+I*(3.49949553979977E-01):e := -2.52285743225507E-01+I*(-6.40275493733767E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.35366609814976E-01+I*(2.18960506498743E-01):b := -7.87700500711362E-01+I*(1.90310162600780E-01):c := 6.66978893578653E-01+I*(-7.81137378982318E-01):d := -8.83217277933864E-02+I*(4.24927667475198E-01):e := -5.26539960274936E-01+I*(-7.63196425362052E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.82648468583415E-01+I*(3.66935180047312E-01):b := -1.13845812623192E+00+I*(2.33465844566995E-01):c := 9.04980100071726E-01+I*(-5.98326048677387E-01):d := -1.51769387128188E-01+I*(4.69565735825348E-01):e := -1.00856668125428E+00+I*(-1.29267129743267E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06061145886809E-01+I*(3.17846266514877E-01):b := -1.43489399379900E+00+I*(4.10623592385409E-02):c := 9.69790743731034E-01+I*(-3.05300218333911E-01):d := -2.29065911246335E-01+I*(4.62977110752522E-01):e := 6.29871545059277E-01+I*(-2.97503909996899E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.95671796335125E-01+I*(9.46630141057696E-02):b := -1.53830246646028E+00+I*(-2.96872564272848E-01):c := 8.31085204098315E-01+I*(-3.91699305889529E-02):d := -2.84043397457773E-01+I*(4.08244683152708E-01):e := 1.03016936337330E+00+I*(-9.79128149118712E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.97462552129114E-01+I*(-1.98184652972230E-01):b := -1.40029757060039E+00+I*(-6.22215419527866E-01):c := 5.53765344708079E-01+I*(7.55394952129288E-02):d := -2.90977268957468E-01+I*(3.30978364183034E-01):e := 5.50196212284774E-01+I*(-6.61117508036410E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10595498730736E-01+I*(-4.23670056654039E-01):b := -1.08545333074574E+00+I*(-7.82734668769613E-01):c := 2.67592209835946E-01+I*(-1.48457561142276E-02):d := -2.46623090209316E-01+I*(2.67331923208894E-01):e := 2.89776190555661E-01+I*(-5.95942639402355E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.77492192778944E-01+I*(-4.76286070565817E-01):b := -7.41088865828285E-01+I*(-7.03321571305138E-01):c := 1.06469389748710E-01+I*(-2.68033420954271E-01):d := -1.71734674391366E-01+I*(2.47086237313488E-01):e := 1.04901426991204E-01+I*(-5.84186127661338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.35390052526597E-01+I*(-8.98402706999371E-02):b := -3.70866633562625E-01+I*(-7.56002270656952E-01):c := 5.16024064153654E-01+I*(-3.95916208159385E-01):d := -5.17441009257054E-01+I*(1.54452530579336E-02):e := -4.26939578806150E-01+I*(-2.84270406107458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.37232613598443E-01+I*(1.84734046514306E-01):b := -3.89275005850190E-01+I*(-4.03079536086750E-01):c := 7.37386555366480E-01+I*(-5.98556787175704E-01):d := -4.84498663887058E-01+I*(8.56803191048989E-02):e := -4.37403437955361E-01+I*(-1.71271547173462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.38755572537079E-01+I*(4.60533312835192E-01):b := -6.30230998106363E-01+I*(-1.44557710039837E-01):c := 1.03721491508644E+00+I*(-6.11499410080618E-01):d := -5.04409593493572E-01+I*(1.60658432600119E-01):e := -4.74100234975935E-01+I*(-7.17332421728511E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.86037431305519E-01+I*(6.08507986383761E-01):b := -9.80988623626918E-01+I*(-1.01402028073621E-01):c := 1.27521612157951E+00+I*(-4.28688079775687E-01):d := -5.67857252828373E-01+I*(2.05296500950270E-01):e := -5.46535735466357E-01+I*(2.84142365212264E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.73278168352937E-02+I*(5.59419072851326E-01):b := -1.27742449119400E+00+I*(-2.93805513402076E-01):c := 1.34002676523882E+00+I*(-1.35662249432210E-01):d := -6.45153776946521E-01+I*(1.98707875877444E-01):e := -7.00186415223394E-01+I*(1.28750842566164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.22828336130216E-02+I*(3.36235820442219E-01):b := -1.38083296385528E+00+I*(-6.31740436913464E-01):c := 1.20132122560610E+00+I*(1.30468038312747E-01):d := -7.00131263157958E-01+I*(1.43975448277630E-01):e := -1.05439964063375E+00+I*(1.02125949716145E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.40735894070108E-02+I*(4.33881533642193E-02):b := -1.24282806799539E+00+I*(-9.57083292168482E-01):c := 9.24001366215861E-01+I*(2.45177464114629E-01):d := -7.07065134657653E-01+I*(6.67091293079555E-02):e := -1.17777361240435E+00+I*(-5.30452018409630E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.27934639913677E-02+I*(-1.82097250317590E-01):b := -9.27983828140741E-01+I*(-1.11760254141023E+00):c := 6.37828231343728E-01+I*(1.54792212787472E-01):d := -6.62710955909501E-01+I*(3.06268833381543E-03):e := -6.39842544018596E-01+I*(-6.33127060352602E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.80881155501047E-01+I*(-2.34713264229368E-01):b := -5.83619363223287E-01+I*(-1.03818944394575E+00):c := 4.76705411256492E-01+I*(-9.83954520525706E-02):d := -5.87822540091551E-01+I*(-1.71829975615905E-02):e := -4.60976050203401E-01+I*(-4.33265861795069E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.52839782587114E-01+I*(1.71621655258643E-01):b := -2.54783037524410E-01+I*(-7.70486846806118E-01):c := 6.98507473825602E-01+I*(-4.92688434292354E-01):d := -7.05301876886740E-01+I*(-2.27146077167524E-01):e := -4.33567604353370E-01+I*(-1.23835285228201E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.54682343658960E-01+I*(4.46195972472886E-01):b := -2.73191409811976E-01+I*(-4.17564112235916E-01):c := 9.19869965038428E-01+I*(-6.95329013308674E-01):d := -6.72359531516745E-01+I*(-1.56911011120558E-01):e := -3.95376837034689E-01+I*(-4.83523540012511E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.56205302597596E-01+I*(7.21995238793772E-01):b := -5.14147402068149E-01+I*(-1.59042286189003E-01):c := 1.21969832475838E+00+I*(-7.08271636213588E-01):d := -6.92270461123258E-01+I*(-8.19328976253377E-02):e := -3.87354961661516E-01+I*(2.40155389714104E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.03487161366035E-01+I*(8.69969912342341E-01):b := -8.64905027588704E-01+I*(-1.15886604222788E-01):c := 1.45769953125146E+00+I*(-5.25460305908656E-01):d := -7.55718120458059E-01+I*(-3.72948292751879E-02):e := -4.04558830345110E-01+I*(9.81412857355615E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.14777546895811E-01+I*(8.20880998809906E-01):b := -1.16134089515579E+00+I*(-3.08290089551242E-01):c := 1.52251017491076E+00+I*(-2.32434475565180E-01):d := -8.33014644576207E-01+I*(-4.38834543480132E-02):e := -4.60945894509381E-01+I*(1.76824102268744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.48331035525047E-02+I*(5.97697746400800E-01):b := -1.26474936781707E+00+I*(-6.46225013062631E-01):c := 1.38380463527805E+00+I*(3.36958121797772E-02):d := -8.87992130787645E-01+I*(-9.86158819478277E-02):e := -5.99683414050554E-01+I*(2.32731510746199E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.66238593464936E-02+I*(3.04850079322800E-01):b := -1.12674447195718E+00+I*(-9.71567868317648E-01):c := 1.10648477588781E+00+I*(1.48405237981659E-01):d := -8.94926002287340E-01+I*(-1.75882200917502E-01):e := -8.09756508853967E-01+I*(1.02272903641817E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10243194051884E-01+I*(7.93646756409911E-02):b := -8.11900232102527E-01+I*(-1.13208711755940E+00):c := 8.20311641015676E-01+I*(5.80199866545028E-02):d := -8.50571823539188E-01+I*(-2.39528641891642E-01):e := -7.28172872500345E-01+I*(-1.73703211274207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.98330885561564E-01+I*(2.67486617292121E-02):b := -4.67535767185072E-01+I*(-1.05267402009492E+00):c := 6.59188820928440E-01+I*(-1.95167678185540E-01):d := -7.75683407721237E-01+I*(-2.59774327787048E-01):e := -5.30145439698675E-01+I*(-1.94999958410444E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.98142564922943E-01+I*(3.83129581001674E-01):b := -1.56547337761823E-01+I*(-7.06965578654898E-01):c := 9.00501863686258E-01+I*(-4.49522185659286E-01):d := -6.93276949327671E-01+I*(-5.33736455692902E-01):e := -4.49895664362814E-01+I*(1.61482298649673E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.99985125994789E-01+I*(6.57703898215917E-01):b := -1.74955710049389E-01+I*(-3.54042844084696E-01):c := 1.12186435489908E+00+I*(-6.52162764675606E-01):d := -6.60334603957674E-01+I*(-4.63501389645937E-01):e := -3.79286638219741E-01+I*(5.64664861152158E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.01508084933425E-01+I*(9.33503164536803E-01):b := -4.15911702305562E-01+I*(-9.55210180377832E-02):c := 1.42169271461904E+00+I*(-6.65105387580520E-01):d := -6.80245533564187E-01+I*(-3.88523276150717E-01):e := -3.41334253304200E-01+I*(1.08877951975480E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.48789943701864E-01+I*(1.08147783808537E+00):b := -7.66669327826117E-01+I*(-5.23653360715675E-02):c := 1.65969392111211E+00+I*(-4.82294057275588E-01):d := -7.43693192898989E-01+I*(-3.43885207800566E-01):e := -3.25493841528666E-01+I*(1.68679856245226E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.99196707683603E-02+I*(1.03238892455294E+00):b := -1.06310519539320E+00+I*(-2.44768821400022E-01):c := 1.72450456477142E+00+I*(-1.89268226932112E-01):d := -8.20989717017138E-01+I*(-3.50473832873392E-01):e := -3.34514433412765E-01+I*(2.39103590670300E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.29530321216676E-01+I*(8.09205672143829E-01):b := -1.16651366805448E+00+I*(-5.82703744911411E-01):c := 1.58579902513870E+00+I*(7.68620608128455E-02):d := -8.75967203228574E-01+I*(-4.05206260473206E-01):e := -3.91322813504242E-01+I*(3.18628320015356E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.31321077010665E-01+I*(5.16358005065830E-01):b := -1.02850877219459E+00+I*(-9.08046600166428E-01):c := 1.30847916574847E+00+I*(1.91571486614727E-01):d := -8.82901074728270E-01+I*(-4.82472579442880E-01):e := -5.41291580994198E-01+I*(3.49914687140346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.44540236122863E-02+I*(2.90872601384021E-01):b := -7.13664532339940E-01+I*(-1.06856584940818E+00):c := 1.02230603087633E+00+I*(1.01186235287570E-01):d := -8.38546895980118E-01+I*(-5.46119020417020E-01):e := -6.71038404098203E-01+I*(1.83296797011790E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43633667897393E-01+I*(2.38256587472243E-01):b := -3.69300067422485E-01+I*(-9.89152751943700E-01):c := 8.61183210789096E-01+I*(-1.52001429552473E-01):d := -7.63658480162167E-01+I*(-5.66364706312426E-01):e := -5.70669591146002E-01+I*(2.53287988386129E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43682946947218E-01+I*(4.45716597425234E-01):b := -1.22125109961969E-01+I*(-5.95160773531508E-01):c := 1.02749181380224E+00+I*(-2.86615429735011E-01):d := -4.86992823826919E-01+I*(-7.60868837033664E-01):e := -4.80120837400826E-01+I*(1.72738593785674E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.45525508019065E-01+I*(7.20290914639477E-01):b := -1.40533482249534E-01+I*(-2.42238038961306E-01):c := 1.24885430501506E+00+I*(-4.89256008751331E-01):d := -4.54050478456923E-01+I*(-6.90633770986699E-01):e := -3.80425474021892E-01+I*(1.67080162944190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.47048466957700E-01+I*(9.96090180960363E-01):b := -3.81489474505707E-01+I*(1.62837870856068E-02):c := 1.54868266473502E+00+I*(-5.02198631656245E-01):d := -4.73961408063436E-01+I*(-6.15655657491478E-01):e := -3.14324968498122E-01+I*(1.97128077056510E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.66967427386034E-03+I*(1.14406485450893E+00):b := -7.32247100026262E-01+I*(5.94394690518224E-02):c := 1.78668387122809E+00+I*(-3.19387301351314E-01):d := -5.37409067398238E-01+I*(-5.71017589141328E-01):e := -2.70364648353138E-01+I*(2.42984458036870E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.94379288744085E-01+I*(1.09497594097650E+00):b := -1.02868296759335E+00+I*(-1.32964016276632E-01):c := 1.85149451488740E+00+I*(-2.63614710078374E-02):d := -6.14705591516386E-01+I*(-5.77606214214153E-01):e := -2.44289276435691E-01+I*(3.04530903794595E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.83989939192401E-01+I*(8.71792688567390E-01):b := -1.13209144025463E+00+I*(-4.70898939788021E-01):c := 1.71278897525468E+00+I*(2.39768816737120E-01):d := -6.69683077727823E-01+I*(-6.32338641813968E-01):e := -2.46217924560608E-01+I*(3.89192895935276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.85780694986389E-01+I*(5.78945021489391E-01):b := -9.94086544394736E-01+I*(-7.96241795043038E-01):c := 1.43546911586445E+00+I*(3.54478242539002E-01):d := -6.76616949227518E-01+I*(-7.09604960783642E-01):e := -3.20449953153193E-01+I*(4.92882340306845E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.98913641588011E-01+I*(3.53459617807581E-01):b := -6.79242304540085E-01+I*(-9.56761044284786E-01):c := 1.14929598099231E+00+I*(2.64092991211845E-01):d := -6.32262770479366E-01+I*(-7.73251401757782E-01):e := -5.18805741888456E-01+I*(4.93973878184095E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08259500783317E-02+I*(3.00843603895803E-01):b := -3.34877839622631E-01+I*(-8.77347946820310E-01):c := 9.88173160905076E-01+I*(1.09053263718022E-02):d := -5.57374354661416E-01+I*(-7.93497087653188E-01):e := -5.91118030127152E-01+I*(2.84738329650187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.52541191442357E-03+I*(3.30097543967532E-01):b := -1.67622897072848E-01+I*(-4.87387142325181E-01):c := 1.02005731517819E+00+I*(-8.01940481234170E-02):d := -1.82972135298970E-01+I*(-8.02265455665229E-01):e := -5.49259943908289E-01+I*(4.04226546346869E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10367972986270E-01+I*(6.04671861181775E-01):b := -1.86031269360414E-01+I*(-1.34464407754979E-01):c := 1.24141980639101E+00+I*(-2.82834627139737E-01):d := -1.50029789928973E-01+I*(-7.32030389618264E-01):e := -4.10783559458986E-01+I*(3.12918918811824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.18909319249057E-02+I*(8.80471127502661E-01):b := -4.26987261616587E-01+I*(1.24057418291934E-01):c := 1.54124816611097E+00+I*(-2.95777250044651E-01):d := -1.69940719535487E-01+I*(-6.57052276123043E-01):e := -3.05295053445996E-01+I*(3.08580122480241E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.40827209306655E-01+I*(1.02844580105123E+00):b := -7.77744887137141E-01+I*(1.67213100258150E-01):c := 1.77924937260404E+00+I*(-1.12965919739719E-01):d := -2.33388378870288E-01+I*(-6.12414207772893E-01):e := -2.26986373064942E-01+I*(3.35572253274690E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.29536823776879E-01+I*(9.79356887518795E-01):b := -1.07418075470423E+00+I*(-2.51903850703050E-02):c := 1.84406001626335E+00+I*(1.80059910603757E-01):d := -3.10684902988436E-01+I*(-6.19002832845718E-01):e := -1.63726279505411E-01+I*(3.83970880387725E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.19147474225195E-01+I*(7.56173635109687E-01):b := -1.17758922736551E+00+I*(-3.63125308581694E-01):c := 1.70535447663063E+00+I*(4.46190198348715E-01):d := -3.65662389199874E-01+I*(-6.73735260445533E-01):e := -1.12819598139834E-01+I*(4.62515783397520E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.20938230019184E-01+I*(4.63325968031688E-01):b := -1.03958433150562E+00+I*(-6.88468163836711E-01):c := 1.42803461724040E+00+I*(5.60899624150597E-01):d := -3.72596260699569E-01+I*(-7.51001579415207E-01):e := -9.66410701560654E-02+I*(5.97201326262472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.34071176620805E-01+I*(2.37840564349879E-01):b := -7.24740091650965E-01+I*(-8.48987413078458E-01):c := 1.14186148236826E+00+I*(4.70514372823440E-01):d := -3.28242081951417E-01+I*(-8.14648020389346E-01):e := -2.34119270253130E-01+I*(7.86258679146039E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.45983485111126E-01+I*(1.85224550438101E-01):b := -3.80375626733510E-01+I*(-7.69574315613983E-01):c := 9.80738662281026E-01+I*(2.17326707983397E-01):d := -2.53353666133466E-01+I*(-8.34893706284753E-01):e := -5.65310974952303E-01+I*(6.90395398430728E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.72972160487087E-02+I*(9.03718607040745E-02):b := -2.71751778853701E-01+I*(-4.34073164847849E-01):c := 8.81677052345548E-01+I*(7.31551006013156E-02):d := 7.65304572803603E-02+I*(-6.38556373657718E-01):e := -8.28166798968650E-01+I*(9.19505802227064E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.54534502313756E-03+I*(3.64946177918318E-01):b := -2.90160151141267E-01+I*(-8.11504302776469E-02):c := 1.10303954355837E+00+I*(-1.29485478415004E-01):d := 1.09472802650356E-01+I*(-5.68321307610753E-01):e := -5.52614495324916E-01+I*(5.55369759284876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.39316960382266E-02+I*(6.40745444239204E-01):b := -5.31116143397440E-01+I*(1.77371395769266E-01):c := 1.40286790327833E+00+I*(-1.42428101319918E-01):d := 8.95618730438432E-02+I*(-4.93343194115533E-01):e := -3.45746724631103E-01+I*(4.82952278474126E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.46649837269787E-01+I*(7.88720117787772E-01):b := -8.81873768917995E-01+I*(2.20527077735481E-01):c := 1.64086910977140E+00+I*(4.03832289850136E-02):d := 2.61142137090415E-02+I*(-4.48705125765383E-01):e := -2.00461301720000E-01+I*(4.79266999740213E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.35359451740012E-01+I*(7.39631204255338E-01):b := -1.17830963648508E+00+I*(2.81235924070273E-02):c := 1.70567975343071E+00+I*(3.33409059328490E-01):d := -5.11823104091064E-02+I*(-4.55293750838208E-01):e := -7.81136499074578E-02+I*(5.04706179720557E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.24970102188327E-01+I*(5.16447951846230E-01):b := -1.28171810914636E+00+I*(-3.09811331104361E-01):c := 1.56697421379799E+00+I*(5.99539347073447E-01):d := -1.06159796620544E-01+I*(-5.10026178438023E-01):e := 4.50627910395586E-02+I*(5.60719466154655E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.26760857982316E-01+I*(2.23600284768231E-01):b := -1.14371321328647E+00+I*(-6.35154186359378E-01):c := 1.28965435440776E+00+I*(7.14248772875329E-01):d := -1.13093668120239E-01+I*(-5.87292497407696E-01):e := 1.88119284813671E-01+I*(6.81735329652643E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.39893804583938E-01+I*(-1.88511891357800E-03):b := -8.28868973431818E-01+I*(-7.95673435601126E-01):c := 1.00348121953562E+00+I*(6.23863521548172E-01):d := -6.87394893720871E-02+I*(-6.50938938381836E-01):e := 3.26723140591559E-01+I*(1.00547068747894E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.51806113074259E-01+I*(-5.45011328253565E-02):b := -4.84504508514363E-01+I*(-7.16260338136651E-01):c := 8.42358399448387E-01+I*(3.70675856708129E-01):d := 6.14892644586329E-03+I*(-6.71184624277242E-01):e := -1.92345097350927E-01+I*(1.64868788772123E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.42693532307232E-02+I*(-1.61290140911967E-01):b := -3.85788694255653E-01+I*(-4.60165043680016E-01):c := 6.77100688209025E-01+I*(1.01678245464936E-01):d := 1.70090806793139E-01+I*(-3.46342889906229E-01):e := -4.45653639140276E+00+I*(-3.37047377827260E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.75732078411231E-02+I*(1.13284176302276E-01):b := -4.04197066543219E-01+I*(-1.07242309109813E-01):c := 8.98463179421851E-01+I*(-1.00962333551384E-01):d := 2.03033152163135E-01+I*(-2.76107823859264E-01):e := -1.38040957809042E+00+I*(6.81089748212438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.09038332202408E-02+I*(3.89083442623163E-01):b := -6.45153058799391E-01+I*(1.51279516937100E-01):c := 1.19829153914181E+00+I*(-1.13904956456299E-01):d := 1.83122222556621E-01+I*(-2.01129710364043E-01):e := -6.59921421496381E-01+I*(7.48882117109128E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.73621974451802E-01+I*(5.37058116171731E-01):b := -9.95910684319946E-01+I*(1.94435198903315E-01):c := 1.43629274563488E+00+I*(6.89063738486330E-02):d := 1.19674563221820E-01+I*(-1.56491642013894E-01):e := -2.79135241739557E-01+I*(7.60754907031338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.62331588922027E-01+I*(4.87969202639297E-01):b := -1.29234655188703E+00+I*(2.03171357486107E-03):c := 1.50110338929419E+00+I*(3.61932204192110E-01):d := 4.23780391036722E-02+I*(-1.63080267086719E-01):e := 1.04881155794220E-02+I*(7.58769219159163E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.51942239370342E-01+I*(2.64785950230189E-01):b := -1.39575502454831E+00+I*(-3.35903209936527E-01):c := 1.36239784966147E+00+I*(6.28062491937067E-01):d := -1.25994471077646E-02+I*(-2.17812694686533E-01):e := 2.97817455020234E-01+I*(7.47389664229116E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.53732995164331E-01+I*(-2.80617168478104E-02):b := -1.25775012868842E+00+I*(-6.61246065191545E-01):c := 1.08507799027123E+00+I*(7.42771917738949E-01):d := -1.95333186074600E-02+I*(-2.95079013656207E-01):e := 6.68743859979119E-01+I*(7.18777505318196E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.66865941765953E-01+I*(-2.53547120529619E-01):b := -9.42905888833770E-01+I*(-8.21765314433293E-01):c := 7.98904855399099E-01+I*(6.52386666411793E-01):d := 2.48208601406919E-02+I*(-3.58725454630347E-01):e := 1.35025695254572E+00+I*(6.24753634312892E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.78778250256274E-01+I*(-3.06163134441398E-01):b := -5.98541423916315E-01+I*(-7.42352216968817E-01):c := 6.37782035311863E-01+I*(3.99199001571750E-01):d := 9.97092759586422E-02+I*(-3.78971140525753E-01):e := 4.01078600684095E+00+I*(-3.06286974567347E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.93438451741555E-01+I*(-3.07133013412845E-01):b := -4.56374503182988E-01+I*(-5.53454098737177E-01):c := 5.02051777161127E-01+I*(-7.97091001368982E-03):d := 5.39309858948755E-02+I*(-6.23549410492062E-02):e := -6.04026808837728E-01+I*(-1.11320897626179E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.95281012813402E-01+I*(-3.25586961986020E-02):b := -4.74782875470554E-01+I*(-2.00531364166975E-01):c := 7.23414268373953E-01+I*(-2.10611489030010E-01):d := 8.68733312648717E-02+I*(7.88012499775909E-03):e := -1.06120519231159E+00+I*(-5.61804243663203E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.96803971752037E-01+I*(2.43240570122284E-01):b := -7.15738867726726E-01+I*(5.79904618799382E-02):c := 1.02324262809391E+00+I*(-2.23554111934924E-01):d := 6.69624016583582E-02+I*(8.28582384929795E-02):e := -1.21564111632050E+00+I*(1.11068850499702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.59141694795233E-02+I*(3.91215243670853E-01):b := -1.06649649324728E+00+I*(1.01146143846154E-01):c := 1.26124383458698E+00+I*(-4.07427816299924E-02):d := 3.51474232355679E-03+I*(1.27496306843130E-01):e := -1.02133553178884E+00+I*(8.49878028924435E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.44623783949748E-01+I*(3.42126330138418E-01):b := -1.36293236081437E+00+I*(-9.12573414823011E-02):c := 1.32605447824629E+00+I*(2.52283048713485E-01):d := -7.37817817945912E-02+I*(1.20907681770304E-01):e := -3.15509243468275E-01+I*(1.49452374306171E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.34234434398063E-01+I*(1.18943077729311E-01):b := -1.46634083347565E+00+I*(-4.29192264993689E-01):c := 1.18734893861357E+00+I*(5.18413336458442E-01):d := -1.28759268006028E-01+I*(6.61752541704897E-02):e := 9.52109050183300E-01+I*(1.48265683146882E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.36025190192053E-01+I*(-1.73904589348689E-01):b := -1.32833593761576E+00+I*(-7.54535120248707E-01):c := 9.10029079223335E-01+I*(6.33122762260323E-01):d := -1.35693139505724E-01+I*(-1.10910647991843E-02):e := 1.82119693271140E+00+I*(2.31258239365519E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.49158136793674E-01+I*(-3.99389993030498E-01):b := -1.01349169776110E+00+I*(-9.15054369490454E-01):c := 6.23855944351201E-01+I*(5.42737510933167E-01):d := -9.13389607575717E-02+I*(-7.47375057733243E-02):e := 1.25302556136810E+00+I*(-1.08369447659025E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.10704452839950E-02+I*(-4.52006006942276E-01):b := -6.69127232843650E-01+I*(-8.35641272025979E-01):c := 4.62733124263965E-01+I*(2.89549846093124E-01):d := -1.64505449396212E-02+I*(-9.49831916687302E-02):e := 1.91408977529542E-01+I*(-1.41072743710326E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.53958297368858E-01+I*(-2.78915255892419E-01):b := -4.50481321164722E-01+I*(-6.70289344365728E-01):c := 4.38437650133111E-01+I*(-2.04486307371490E-01):d := -2.17596534243524E-01+I*(8.05263554686616E-02):e := -4.41537271491953E-01+I*(-5.29295942731499E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.55800858440704E-01+I*(-4.34093867817550E-03):b := -4.68889693452288E-01+I*(-3.17366609795526E-01):c := 6.59800141345936E-01+I*(-4.07126886387809E-01):d := -1.84654188873527E-01+I*(1.50761421515627E-01):e := -5.56313962813529E-01+I*(-3.49514895316658E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.57323817379340E-01+I*(2.71458327642710E-01):b := -7.09845685708461E-01+I*(-5.88447837486129E-02):c := 9.59628501065891E-01+I*(-4.20069509292724E-01):d := -2.04565118480041E-01+I*(2.25739535010847E-01):e := -6.86898224702426E-01+I*(-1.73422626987829E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.04605676147779E-01+I*(4.19433001191279E-01):b := -1.06060331122902E+00+I*(-1.56891017823982E-02):c := 1.19762970755896E+00+I*(-2.37258178987791E-01):d := -2.68012777814842E-01+I*(2.70377603360997E-01):e := -8.81343892187414E-01+I*(4.77846823724051E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.41039383224454E-02+I*(3.70344087658845E-01):b := -1.35703917879610E+00+I*(-2.08092587110853E-01):c := 1.26244035121827E+00+I*(5.57676513556846E-02):d := -3.45309301932990E-01+I*(2.63788978288172E-01):e := -1.31808555797216E+00+I*(4.22422812503771E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.73714588770761E-01+I*(1.47160835249737E-01):b := -1.46044765145738E+00+I*(-5.46027510622241E-01):c := 1.12373481158555E+00+I*(3.21897939100642E-01):d := -4.00286788144428E-01+I*(2.09056550688358E-01):e := -3.85290455730048E+00+I*(8.99713270835782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.75505344564750E-01+I*(-1.45686831828262E-01):b := -1.32244275559749E+00+I*(-8.71370365877258E-01):c := 8.46414952195318E-01+I*(4.36607364902523E-01):d := -4.07220659644123E-01+I*(1.31790231718683E-01):e := -1.00315694463253E-01+I*(-2.84182854241822E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.86382911663718E-02+I*(-3.71172235510071E-01):b := -1.00759851574284E+00+I*(-1.03188961511901E+00):c := 5.60241817323184E-01+I*(3.46222113575367E-01):d := -3.62866480895971E-01+I*(6.81437907445436E-02):e := -1.42890038974515E-01+I*(-1.21022664190386E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.99449400343307E-01+I*(-4.23788249421850E-01):b := -6.63234050825384E-01+I*(-9.52476517654531E-01):c := 3.99118997235949E-01+I*(9.30344487353243E-02):d := -2.87978065078021E-01+I*(4.78981048491376E-02):e := -3.14845223712688E-01+I*(-7.66676844039387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.18465300400805E-01+I*(-3.55107855710585E-02):b := -1.51072672754093E-01+I*(-8.96821922345209E-01):c := 5.08116716857818E-01+I*(6.87893686775632E-02):d := -4.78452949197189E-01+I*(-2.11861520192962E-01):e := -5.34524355236980E-01+I*(-5.16609601169101E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.20307861472652E-01+I*(2.39063531643185E-01):b := -1.69481045041658E-01+I*(-5.43899187775007E-01):c := 7.29479208070644E-01+I*(-1.33851210338756E-01):d := -4.45510603827192E-01+I*(-1.41626454145997E-01):e := -4.50435775428562E-01+I*(2.54805642650012E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.21830820411288E-01+I*(5.14862797964071E-01):b := -4.10437037297831E-01+I*(-2.85377361728094E-01):c := 1.02930756779060E+00+I*(-1.46793833243670E-01):d := -4.65421533433706E-01+I*(-6.66483406507764E-02):e := -4.09121361389438E-01+I*(1.05170098864748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69112679179727E-01+I*(6.62837471512639E-01):b := -7.61194662818385E-01+I*(-2.42221679761879E-01):c := 1.26730877428367E+00+I*(3.60174970612614E-02):d := -5.28869192768507E-01+I*(-2.20102723006264E-02):e := -3.93958519990321E-01+I*(1.90944022304512E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.04030647095023E-02+I*(6.13748557980205E-01):b := -1.05763053038547E+00+I*(-4.34625165090333E-01):c := 1.33211941794298E+00+I*(3.29043327404738E-01):d := -6.06165716886655E-01+I*(-2.85988973734517E-02):e := -4.09797256002494E-01+I*(2.93690667371646E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09207585738813E-01+I*(3.90565305571097E-01):b := -1.16103900304675E+00+I*(-7.72560088601721E-01):c := 1.19341387831026E+00+I*(5.95173615149695E-01):d := -6.61143203098092E-01+I*(-8.33313249732662E-02):e := -4.97063114204087E-01+I*(4.21499502989222E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10998341532802E-01+I*(9.77176384930982E-02):b := -1.02303410718686E+00+I*(-1.09790294385674E+00):c := 9.16094018920026E-01+I*(7.09883040951577E-01):d := -6.68077074597787E-01+I*(-1.60597643942940E-01):e := -7.69195332015238E-01+I*(4.79189525165705E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.58687118655758E-02+I*(-1.27767765188711E-01):b := -7.08189867332209E-01+I*(-1.25842219309849E+00):c := 6.29920884047892E-01+I*(6.19497789624420E-01):d := -6.23722895849635E-01+I*(-2.24244084917080E-01):e := -9.66654114149114E-01+I*(1.13662556740661E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.63956403375255E-01+I*(-1.80383779100490E-01):b := -3.63825402414755E-01+I*(-1.17900909563401E+00):c := 4.68798063960656E-01+I*(3.66310124784377E-01):d := -5.48834480031685E-01+I*(-2.44489770812486E-01):e := -7.11105614165236E-01+I*(-9.31986705764678E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.35915030461322E-01+I*(2.25951140387522E-01):b := -3.49890767158782E-02+I*(-9.11306498494375E-01):c := 6.90600126529766E-01+I*(-2.79828574554057E-02):d := -6.66313816826875E-01+I*(-4.54452850418420E-01):e := -4.16781755167761E-01+I*(5.15516936301604E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.37757591533169E-01+I*(5.00525457601765E-01):b := -5.33974490034439E-02+I*(-5.58383763924173E-01):c := 9.11962617742592E-01+I*(-2.30623436471726E-01):d := -6.33371471456879E-01+I*(-3.84217784371454E-01):e := -3.50458446912113E-01+I*(7.67971298950480E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.39280550471805E-01+I*(7.76324723922651E-01):b := -2.94353441259616E-01+I*(-2.99861937877260E-01):c := 1.21179097746255E+00+I*(-2.43566059376640E-01):d := -6.53282401063392E-01+I*(-3.09239670876234E-01):e := -3.12110943649089E-01+I*(1.18145646709745E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.86562409240244E-01+I*(9.24299397471219E-01):b := -6.45111066780171E-01+I*(-2.56706255911045E-01):c := 1.44979218395562E+00+I*(-6.07547290717079E-02):d := -7.16730060398194E-01+I*(-2.64601602526084E-01):e := -2.93693455489234E-01+I*(1.68041210851342E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.78527947700194E-02+I*(8.75210483938785E-01):b := -9.41546934347256E-01+I*(-4.49109741239499E-01):c := 1.51460282761493E+00+I*(2.32271101271768E-01):d := -7.94026584516342E-01+I*(-2.71190227598909E-01):e := -2.96808469045143E-01+I*(2.27566016264786E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.17578556782961E-02+I*(6.52027231529678E-01):b := -1.04495540700854E+00+I*(-7.87044664750887E-01):c := 1.37589728798221E+00+I*(4.98401389016725E-01):d := -8.49004070727779E-01+I*(-3.25922655198724E-01):e := -3.38356708554651E-01+I*(2.94824365125774E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.35486114722854E-02+I*(3.59179564451679E-01):b := -9.06950511148645E-01+I*(-1.11238752000590E+00):c := 1.09857742859197E+00+I*(6.13110814818607E-01):d := -8.55937942227474E-01+I*(-4.03188974168398E-01):e := -4.51323734276775E-01+I*(3.29198467487598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.33184419260925E-02+I*(1.33694160769870E-01):b := -5.92106271293995E-01+I*(-1.27290676924765E+00):c := 8.12404293719840E-01+I*(5.22725563491451E-01):d := -8.11583763479322E-01+I*(-4.66835415142538E-01):e := -5.68612520255316E-01+I*(2.19788189089437E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.81406133435772E-01+I*(8.10781468580909E-02):b := -2.47741806376540E-01+I*(-1.19349367178318E+00):c := 6.51281473632604E-01+I*(2.69537898651408E-01):d := -7.36695347661371E-01+I*(-4.87081101037944E-01):e := -5.16339975870636E-01+I*(7.92023573011140E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.81217812797152E-01+I*(4.37459066130552E-01):b := 6.32466230467092E-02+I*(-8.47785230343156E-01):c := 8.92594516390423E-01+I*(1.51833911776619E-02):d := -6.54288889267805E-01+I*(-7.61043228943798E-01):e := -3.51699878074077E-01+I*(1.40798584247599E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.83060373868998E-01+I*(7.12033383344796E-01):b := 4.48382507591435E-02+I*(-4.94862495772953E-01):c := 1.11395700760325E+00+I*(-1.87457187838658E-01):d := -6.21346543897809E-01+I*(-6.90808162896832E-01):e := -2.94288738916499E-01+I*(1.34614062251640E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.84583332807634E-01+I*(9.87832649665682E-01):b := -1.96117741497029E-01+I*(-2.36340669726040E-01):c := 1.41378536732320E+00+I*(-2.00399810743572E-01):d := -6.41257473504322E-01+I*(-6.15830049401612E-01):e := -2.53224266564018E-01+I*(1.53309012191958E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31865191576074E-01+I*(1.13580732321425E+00):b := -5.46875367017584E-01+I*(-1.93184987759825E-01):c := 1.65178657381628E+00+I*(-1.75884804386406E-02):d := -7.04705132839123E-01+I*(-5.71191981051462E-01):e := -2.26979881894422E-01+I*(1.84528312623102E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.68444228941515E-02+I*(1.08671840968182E+00):b := -8.43311234584668E-01+I*(-3.85588473088279E-01):c := 1.71659721747558E+00+I*(2.75437349904836E-01):d := -7.82001656957271E-01+I*(-5.77780606124287E-01):e := -2.15687914245935E-01+I*(2.26071001892157E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.46455073342467E-01+I*(8.63535157272708E-01):b := -9.46719707245951E-01+I*(-7.23523396599668E-01):c := 1.57789167784287E+00+I*(5.41567637649793E-01):d := -8.36979143168708E-01+I*(-6.32513033724101E-01):e := -2.27835670531210E-01+I*(2.77495190901118E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.48245829136456E-01+I*(5.70687490194709E-01):b := -8.08714811386058E-01+I*(-1.04886625185468E+00):c := 1.30057181845263E+00+I*(6.56277063451675E-01):d := -8.43913014668404E-01+I*(-7.09779352693775E-01):e := -2.84407596184454E-01+I*(3.23353681070801E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.13787757380778E-02+I*(3.45202086512900E-01):b := -4.93870571531408E-01+I*(-1.20938550109643E+00):c := 1.01439868358050E+00+I*(5.65891812124519E-01):d := -7.99558835920253E-01+I*(-7.73425793667916E-01):e := -3.80128790201971E-01+I*(3.00862333693318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26708915771602E-01+I*(2.92586072601121E-01):b := -1.49506106613953E-01+I*(-1.12997240363196E+00):c := 8.53275863493260E-01+I*(3.12704147284475E-01):d := -7.24670420102302E-01+I*(-7.93671479563322E-01):e := -4.05885473596624E-01+I*(2.00730550340182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26758194821426E-01+I*(5.00046082554113E-01):b := 9.76688508465634E-02+I*(-7.35980425219765E-01):c := 1.01958446650640E+00+I*(1.78090147101937E-01):d := -4.48004763767053E-01+I*(-9.88175610284560E-01):e := -3.07215443823345E-01+I*(2.31707230054519E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.28600755893273E-01+I*(7.74620399768356E-01):b := 7.92604785589979E-02+I*(-3.83057690649563E-01):c := 1.24094695771923E+00+I*(-2.45504319143827E-02):d := -4.15062418397057E-01+I*(-9.17940544237595E-01):e := -2.58428358202233E-01+I*(1.98435431880770E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.30123714831909E-01+I*(1.05041966608924E+00):b := -1.61695513697174E-01+I*(-1.24535864602650E-01):c := 1.54077531743918E+00+I*(-3.74930548192967E-02):d := -4.34973348003570E-01+I*(-8.42962430742375E-01):e := -2.13687299272144E-01+I*(1.98330478436032E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25944263996519E-02+I*(1.19839433963781E+00):b := -5.12453139217729E-01+I*(-8.13801826364348E-02):c := 1.77877652393226E+00+I*(1.45318275485635E-01):d := -4.98421007338371E-01+I*(-7.98324362392224E-01):e := -1.79377689695505E-01+I*(2.15892610141745E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.11304040869877E-01+I*(1.14930542610538E+00):b := -8.08889006784814E-01+I*(-2.73783667964889E-01):c := 1.84358716759156E+00+I*(4.38344105829111E-01):d := -5.75717531456519E-01+I*(-8.04912987465049E-01):e := -1.55799865362915E-01+I*(2.46376640022174E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00914691318192E-01+I*(9.26122173696269E-01):b := -9.12297479446097E-01+I*(-6.11718591476277E-01):c := 1.70488162795885E+00+I*(7.04474393574068E-01):d := -6.30695017667956E-01+I*(-8.59645415064864E-01):e := -1.47659951637352E-01+I*(2.90353824836798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.02705447112181E-01+I*(6.33274506618269E-01):b := -7.74292583586204E-01+I*(-9.37061446731294E-01):c := 1.42756176856861E+00+I*(8.19183819375950E-01):d := -6.37628889167652E-01+I*(-9.36911734034538E-01):e := -1.71340658573262E-01+I*(3.44414338330119E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.15838393713803E-01+I*(4.07789102936460E-01):b := -4.59448343731553E-01+I*(-1.09758069597304E+00):c := 1.14138863369648E+00+I*(7.28798568048794E-01):d := -5.93274710419500E-01+I*(-1.00055817500868E+00):e := -2.47536009573950E-01+I*(3.71592410188318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.77507022041237E-02+I*(3.55173089024681E-01):b := -1.15083878814098E-01+I*(-1.01816759850857E+00):c := 9.80265813609240E-01+I*(4.75610903208751E-01):d := -5.18386294601549E-01+I*(-1.02080386090408E+00):e := -3.19831644972722E-01+I*(3.11653195697484E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.39934021136788E-03+I*(3.84427029096410E-01):b := 5.21710637356842E-02+I*(-6.28206794013438E-01):c := 1.01214996788235E+00+I*(3.84511528713531E-01):d := -1.43984075239104E-01+I*(-1.02957222891612E+00):e := -2.75310677870393E-01+I*(3.45291638343655E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.34432208604785E-02+I*(6.59001346310654E-01):b := 3.37626914481184E-02+I*(-2.75284059443236E-01):c := 1.23351245909518E+00+I*(1.81870949697211E-01):d := -1.11041729869108E-01+I*(-9.59337162869159E-01):e := -2.37995214242965E-01+I*(2.78801006935623E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.03382020088539E-03+I*(9.34800612631539E-01):b := -2.07193300808054E-01+I*(-1.67622333963231E-02):c := 1.53334081881513E+00+I*(1.68928326792297E-01):d := -1.30952659475621E-01+I*(-8.84359049373939E-01):e := -1.87479817532043E-01+I*(2.57178255168487E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.57751961432447E-01+I*(1.08277528618011E+00):b := -5.57950926328609E-01+I*(2.63934485698923E-02):c := 1.77134202530821E+00+I*(3.51739657097230E-01):d := -1.94400318810422E-01+I*(-8.39720981023789E-01):e := -1.43025642504784E-01+I*(2.61109609798104E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.46461575902671E-01+I*(1.03368637264767E+00):b := -8.54386793895694E-01+I*(-1.66010036758562E-01):c := 1.83615266896751E+00+I*(6.44765487440706E-01):d := -2.71696842928570E-01+I*(-8.46309606096614E-01):e := -1.06288212790002E-01+I*(2.81991825172266E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.36072226350985E-01+I*(8.10503120238566E-01):b := -9.57795266556975E-01+I*(-5.03944960269950E-01):c := 1.69744712933479E+00+I*(9.10895775185661E-01):d := -3.26674329140008E-01+I*(-9.01042033696428E-01):e := -7.92998005461426E-02+I*(3.20263996576227E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.37862982144975E-01+I*(5.17655453160567E-01):b := -8.19790370697083E-01+I*(-8.29287815524967E-01):c := 1.42012726994456E+00+I*(1.02560520098754E+00):d := -3.33608200639703E-01+I*(-9.78308352666102E-01):e := -7.42708228011708E-02+I*(3.80262896574494E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.50995928746597E-01+I*(2.92170049478758E-01):b := -5.04946130842432E-01+I*(-9.89807064766715E-01):c := 1.13395413507242E+00+I*(9.35219949660387E-01):d := -2.89254021891551E-01+I*(-1.04195479364024E+00):e := -1.25280926034532E-01+I*(4.48152740749809E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.62908237236918E-01+I*(2.39554035566980E-01):b := -1.60581665924978E-01+I*(-9.10393967302240E-01):c := 9.72831314985190E-01+I*(6.82032284820345E-01):d := -2.14365606073601E-01+I*(-1.06220047953565E+00):e := -2.34447409293061E-01+I*(4.40752588204815E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.14221968174500E-01+I*(1.44701345832953E-01):b := -5.19578180451690E-02+I*(-5.74892816536106E-01):c := 8.73769705049712E-01+I*(5.37860677438264E-01):d := 1.15518517340226E-01+I*(-8.65863146908614E-01):e := -2.70635670365981E-01+I*(5.26824073157364E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.23794071026538E-02+I*(4.19275663047196E-01):b := -7.03661903327347E-02+I*(-2.21970081965904E-01):c := 1.09513219626254E+00+I*(3.35220098421944E-01):d := 1.48460862710222E-01+I*(-7.95628080861649E-01):e := -2.49043039892804E-01+I*(3.97714012431751E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10856448164018E-01+I*(6.95074929368082E-01):b := -3.11322182588907E-01+I*(3.65517440810090E-02):c := 1.39496055598249E+00+I*(3.22277475517030E-01):d := 1.28549933103709E-01+I*(-7.20649967366428E-01):e := -1.82881297194325E-01+I*(3.42931209031850E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.63574589395578E-01+I*(8.43049602916650E-01):b := -6.62079808109462E-01+I*(7.97074260472244E-02):c := 1.63296176247557E+00+I*(5.05088805821961E-01):d := 6.51022737689073E-02+I*(-6.76011899016278E-01):e := -1.19957613234867E-01+I*(3.29903271862802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.52284203865803E-01+I*(7.93960689384216E-01):b := -9.58515675676547E-01+I*(-1.12696059281230E-01):c := 1.69777240613487E+00+I*(7.98114636165438E-01):d := -1.21942503492405E-02+I*(-6.82600524089103E-01):e := -6.36768454426415E-02+I*(3.40659502976111E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.41894854314118E-01+I*(5.70777436975108E-01):b := -1.06192414833783E+00+I*(-4.50630982792618E-01):c := 1.55906686650215E+00+I*(1.06424492391040E+00):d := -6.71717365606775E-02+I*(-7.37332951688918E-01):e := -1.23408952893288E-02+I*(3.73653806333712E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.43685610108108E-01+I*(2.77929769897110E-01):b := -9.23919252477936E-01+I*(-7.75973838047635E-01):c := 1.28174700711192E+00+I*(1.17895434971228E+00):d := -7.41056080603730E-02+I*(-8.14599270658592E-01):e := 2.82439152624114E-02+I*(4.39797219332211E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.56818556709729E-01+I*(5.24443662153008E-02):b := -6.09075012623286E-01+I*(-9.36493087289383E-01):c := 9.95573872239786E-01+I*(1.08856909838512E+00):d := -2.97514293122213E-02+I*(-8.78245711632732E-01):e := 1.89733658012201E-02+I*(5.54612464638149E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.68730865200050E-01+I*(-1.71647696477801E-04):b := -2.64710547705831E-01+I*(-8.57079989824908E-01):c := 8.34451052152550E-01+I*(8.35381433545077E-01):d := 4.51369865057292E-02+I*(-8.98491397528138E-01):e := -1.28444410714772E-01+I*(6.41028726119023E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.11941053565147E-02+I*(-1.06960655783088E-01):b := -1.65994733447120E-01+I*(-6.00984695368272E-01):c := 6.69193340913189E-01+I*(5.66383822301883E-01):d := 2.09078866853005E-01+I*(-5.73649663157125E-01):e := -4.59188258673486E-01+I*(8.94978633249122E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.06484557153316E-02+I*(1.67613661431155E-01):b := -1.84403105734686E-01+I*(-2.48061960798070E-01):c := 8.90555832126015E-01+I*(3.63743243285564E-01):d := 2.42021212223001E-01+I*(-5.03414597110159E-01):e := -3.91993877727486E-01+I*(5.72993970131883E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78285853460323E-02+I*(4.43412927752041E-01):b := -4.25359097990859E-01+I*(1.04598652488428E-02):c := 1.19038419184597E+00+I*(3.50800620380649E-01):d := 2.22110282616487E-01+I*(-4.28436483614939E-01):e := -2.52987533392244E-01+I*(4.68272365980275E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.90546726577593E-01+I*(5.91387601300610E-01):b := -7.76116723511414E-01+I*(5.36155472150582E-02):c := 1.42838539833904E+00+I*(5.33611950685582E-01):d := 1.58662623281686E-01+I*(-3.83798415264789E-01):e := -1.40327917545917E-01+I*(4.40787609855627E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.79256341047818E-01+I*(5.42298687768175E-01):b := -1.07255259107850E+00+I*(-1.38787938113396E-01):c := 1.49319604199835E+00+I*(8.26637781029058E-01):d := 8.13660991635378E-02+I*(-3.90387040337614E-01):e := -4.27597768529869E-02+I*(4.46548453172668E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.68866991496133E-01+I*(3.19115435359068E-01):b := -1.17596106373978E+00+I*(-4.76722861624785E-01):c := 1.35449050236563E+00+I*(1.09276806877401E+00):d := 2.63886129521009E-02+I*(-4.45119467937429E-01):e := 5.35995709440323E-02+I*(4.80393901987782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.70657747290122E-01+I*(2.62677682810687E-02):b := -1.03795616787989E+00+I*(-8.02065716879801E-01):c := 1.07717064297540E+00+I*(1.20747749457590E+00):d := 1.94547414524056E-02+I*(-5.22385786907102E-01):e := 1.58198599658167E-01+I*(5.62643985540976E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.83790693891745E-01+I*(-1.99217635400740E-01):b := -7.23111928025237E-01+I*(-9.62584966121549E-01):c := 7.90997508103263E-01+I*(1.11709224324874E+00):d := 6.38089202005573E-02+I*(-5.86032227881243E-01):e := 2.45530377311986E-01+I*(7.66179227822389E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.95703002382065E-01+I*(-2.51833649312519E-01):b := -3.78747463107783E-01+I*(-8.83171868657074E-01):c := 6.29874688016027E-01+I*(8.63904578408697E-01):d := 1.38697336018508E-01+I*(-6.06277913776649E-01):e := 2.20543374972177E-02+I*(1.13277947470095E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76513699615764E-01+I*(-2.52803528283967E-01):b := -2.36580542374456E-01+I*(-6.94273750425434E-01):c := 4.94144429865292E-01+I*(4.56734666823258E-01):d := 9.29190459547410E-02+I*(-2.89661714300102E-01):e := -1.47473415941006E+00+I*(5.03661449262764E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.78356260687610E-01+I*(2.17707889302767E-02):b := -2.54988914662022E-01+I*(-3.41351015855232E-01):c := 7.15506921078117E-01+I*(2.54094087806938E-01):d := 1.25861391324737E-01+I*(-2.19426648253136E-01):e := -8.08011917842165E-01+I*(4.27701046750792E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.79879219626246E-01+I*(2.97570055251163E-01):b := -4.95944906918194E-01+I*(-8.28291898083186E-02):c := 1.01533528079807E+00+I*(2.41151464902024E-01):d := 1.05950461718224E-01+I*(-1.44448534757916E-01):e := -5.11092260464026E-01+I*(4.76619345500694E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.28389216053146E-02+I*(4.45544728799731E-01):b := -8.46702532438749E-01+I*(-3.96735078421033E-02):c := 1.25333648729115E+00+I*(4.23962795206956E-01):d := 4.25028023834226E-02+I*(-9.98104664077658E-02):e := -3.15249682108561E-01+I*(5.38690763158945E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.61548536075540E-01+I*(3.96455815267297E-01):b := -1.14313840000583E+00+I*(-2.32076993170558E-01):c := 1.31814713095045E+00+I*(7.16988625550433E-01):d := -3.47937217347254E-02+I*(-1.06399091480591E-01):e := -1.45702751564854E-01+I*(6.13955411077653E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.51159186523855E-01+I*(1.73272562858189E-01):b := -1.24654687266712E+00+I*(-5.70011916681947E-01):c := 1.17944159131773E+00+I*(9.83118913295390E-01):d := -8.97712079461625E-02+I*(-1.61131519080405E-01):e := 3.98268750526106E-02+I*(7.23011805127669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.52949942317844E-01+I*(-1.19575104219810E-01):b := -1.10854197680722E+00+I*(-8.95354771936963E-01):c := 9.02121731927498E-01+I*(1.09782833909727E+00):d := -9.67050794458578E-02+I*(-2.38397838050079E-01):e := 2.98685147731935E-01+I*(9.35574461806858E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.66082888919466E-01+I*(-3.45060507901619E-01):b := -7.93697736952573E-01+I*(-1.05587402117871E+00):c := 6.15948597055365E-01+I*(1.00744308777011E+00):d := -5.23509006977062E-02+I*(-3.02044279024220E-01):e := 7.34344107630147E-01+I*(1.64682194961800E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.79951974097862E-02+I*(-3.97676521813398E-01):b := -4.49333272035118E-01+I*(-9.76460923714236E-01):c := 4.54825776968129E-01+I*(7.54255422930071E-01):d := 2.25375151202443E-02+I*(-3.22289964919626E-01):e := -2.24368007599663E+00+I*(3.38109864446721E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.37033545243066E-01+I*(-2.24585770763540E-01):b := -2.30687360356190E-01+I*(-8.11108996053985E-01):c := 4.30530302837275E-01+I*(2.60219269465458E-01):d := -1.78608474183657E-01+I*(-1.46780417782234E-01):e := -8.34008259443180E-01+I*(-1.52899528973092E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.38876106314912E-01+I*(4.99885464507032E-02):b := -2.49095732643756E-01+I*(-4.58186261483783E-01):c := 6.51892794050100E-01+I*(5.75786904491387E-02):d := -1.45666128813661E-01+I*(-7.65453517352689E-02):e := -6.55716184149425E-01+I*(3.95510906675116E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.40399065253548E-01+I*(3.25787812771589E-01):b := -4.90051724899928E-01+I*(-1.99664435436870E-01):c := 9.51721153770056E-01+I*(4.46360675442245E-02):d := -1.65577058420175E-01+I*(-1.56723824004855E-03):e := -5.57887132264231E-01+I*(1.93900327337325E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87680924021987E-01+I*(4.73762486320158E-01):b := -8.40809350420483E-01+I*(-1.56508753470655E-01):c := 1.18972236026313E+00+I*(2.27447397849156E-01):d := -2.29024717754976E-01+I*(4.30708301101013E-02):e := -4.89598367557243E-01+I*(3.46066193754032E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01028690448237E-01+I*(4.24673572787723E-01):b := -1.13724521798757E+00+I*(-3.48912238799109E-01):c := 1.25453300392244E+00+I*(5.20473228192633E-01):d := -3.06321241873124E-01+I*(3.64822050372759E-02):e := -4.36933732906639E-01+I*(5.33556282895759E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.90639340896553E-01+I*(2.01490320378616E-01):b := -1.24065369064885E+00+I*(-6.86847162310497E-01):c := 1.11582746428972E+00+I*(7.86603515937590E-01):d := -3.61298728084561E-01+I*(-1.82502225625385E-02):e := -4.15801290967573E-01+I*(8.36140018606251E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.92430096690542E-01+I*(-9.13573466993836E-02):b := -1.10264879478896E+00+I*(-1.01219001756551E+00):c := 8.38507604899482E-01+I*(9.01312941739472E-01):d := -3.68232599584256E-01+I*(-9.55165415322121E-02):e := -6.72448557008107E-01+I*(1.52114010793176E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05563043292164E-01+I*(-3.16842750381193E-01):b := -7.87804554934306E-01+I*(-1.17270926680726E+00):c := 5.52334470027348E-01+I*(8.10927690412315E-01):d := -3.23878420836104E-01+I*(-1.59162982506352E-01):e := -2.85894560383985E+00+I*(7.56000645594808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.82524648217516E-01+I*(-3.69458764292971E-01):b := -4.43440090016852E-01+I*(-1.09329616934279E+00):c := 3.91211649940113E-01+I*(5.57740025572272E-01):d := -2.48990005018154E-01+I*(-1.79408668401758E-01):e := -1.32282203400645E+00+I*(-4.12231036444479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.62386953516248E-01+I*(-1.94091365363914E-01):b := 4.05784405241614E-01+I*(-1.14062698766743E+00):c := -1.02356023518203E-01+I*(6.96444460373436E-01):d := -5.17584140775659E-02+I*(-2.78925436082411E-01):e := -6.13050889565314E-01+I*(4.27551432249885E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.64229514588094E-01+I*(8.04829518503289E-02):b := 3.87376032954048E-01+I*(-7.87704253097231E-01):c := 1.19006467694623E-01+I*(4.93803881357117E-01):d := -1.88160687075698E-02+I*(-2.08690370035446E-01):e := -4.45975636795709E-01+I*(3.27443147753319E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.65752473526730E-01+I*(3.56282218171215E-01):b := 1.46420040697875E-01+I*(-5.29182427050317E-01):c := 4.18834827414578E-01+I*(4.80861258452202E-01):d := -3.87269983140829E-02+I*(-1.33712256540225E-01):e := -3.25970936569863E-01+I*(3.25380399187997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.13034332295169E-01+I*(5.04256891719783E-01):b := -2.04337584822680E-01+I*(-4.86026745084102E-01):c := 6.56836033907652E-01+I*(6.63672588757134E-01):d := -1.02174657648884E-01+I*(-8.90741881900751E-02):e := -2.38205632268623E-01+I*(3.55781207238409E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.75675282175056E-01+I*(4.55167978187349E-01):b := -5.00773452389764E-01+I*(-6.78430230412557E-01):c := 7.21646677566959E-01+I*(9.56698419100611E-01):d := -1.79471181767032E-01+I*(-9.56628132629005E-02):e := -1.66474124860207E-01+I*(4.08344706699316E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.65285932623371E-01+I*(2.31984725778241E-01):b := -6.04181925051046E-01+I*(-1.01636515392394E+00):c := 5.82941137934240E-01+I*(1.22282870684557E+00):d := -2.34448667978469E-01+I*(-1.50395240862715E-01):e := -1.05580896861656E-01+I*(4.93716016649407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67076688417360E-01+I*(-6.08629412997581E-02):b := -4.66177029191153E-01+I*(-1.34170800917896E+00):c := 3.05621278544004E-01+I*(1.33753813264745E+00):d := -2.41382539478164E-01+I*(-2.27661559832388E-01):e := -7.62423881444162E-02+I*(6.45462695281421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.80209635018982E-01+I*(-2.86348344981567E-01):b := -1.51332789336503E-01+I*(-1.50222725842071E+00):c := 1.94481436718712E-02+I*(1.24715288132029E+00):d := -1.97028360730013E-01+I*(-2.91308000806528E-01):e := -2.19704366335869E-01+I*(8.84880986122139E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07878056490698E-01+I*(-3.38964358893346E-01):b := 1.93031675580952E-01+I*(-1.42281416095623E+00):c := -1.41674676415365E-01+I*(9.93965216480250E-01):d := -1.22139944912063E-01+I*(-3.11553686701934E-01):e := -6.42463795550707E-01+I*(7.82848872667049E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.79836683576764E-01+I*(6.73705605946659E-02):b := 5.21868001279829E-01+I*(-1.15511156381660E+00):c := 8.01273861537452E-02+I*(5.99672234240467E-01):d := -2.39619281707252E-01+I*(-5.21516766307868E-01):e := -3.90791199796986E-01+I*(3.00747958348378E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.81679244648610E-01+I*(3.41944877808909E-01):b := 5.03459628992262E-01+I*(-8.02188829246397E-01):c := 3.01489877366571E-01+I*(3.97031655224148E-01):d := -2.06676936337255E-01+I*(-4.51281700260903E-01):e := -3.15031757713037E-01+I*(2.46877311754081E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.83202203587246E-01+I*(6.17744144129795E-01):b := 2.62503636736089E-01+I*(-5.43667003199483E-01):c := 6.01318237086526E-01+I*(3.84089032319234E-01):d := -2.26587865943769E-01+I*(-3.76303586765683E-01):e := -2.49286018260435E-01+I*(2.44289282018259E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.30484062355685E-01+I*(7.65718817678364E-01):b := -8.82539887844652E-02+I*(-5.00511321233268E-01):c := 8.39319443579600E-01+I*(5.66900362624166E-01):d := -2.90035525278570E-01+I*(-3.31665518415533E-01):e := -1.98987351412586E-01+I*(2.65328379643840E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.58225552114539E-01+I*(7.16629904145929E-01):b := -3.84689856351550E-01+I*(-6.92914806561723E-01):c := 9.04130087238907E-01+I*(8.59926192967642E-01):d := -3.67332049396718E-01+I*(-3.38254143488358E-01):e := -1.61111895749891E-01+I*(3.03327835473005E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.47836202562855E-01+I*(4.93446651736821E-01):b := -4.88098329012832E-01+I*(-1.03084973007311E+00):c := 7.65424547606188E-01+I*(1.12605648071260E+00):d := -4.22309535608155E-01+I*(-3.92986571088172E-01):e := -1.38854386631711E-01+I*(3.61960217278094E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.49626958356844E-01+I*(2.00598984658822E-01):b := -3.50093433152939E-01+I*(-1.35619258532813E+00):c := 4.88104688215952E-01+I*(1.24076590651448E+00):d := -4.29243407107850E-01+I*(-4.70252890057846E-01):e := -1.54262624594934E-01+I*(4.46901798339426E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.62759904958465E-01+I*(-2.48864190229869E-02):b := -3.52491932982886E-02+I*(-1.51671183456988E+00):c := 2.01931553343819E-01+I*(1.15038065518732E+00):d := -3.84889228359698E-01+I*(-5.33899331031986E-01):e := -2.61647212046288E-01+I*(5.19230014053471E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.25327786551214E-01+I*(-7.75024329347655E-02):b := 3.09115271619166E-01+I*(-1.43729873710540E+00):c := 4.08087332565829E-02+I*(8.97192990347281E-01):d := -3.10000812541748E-01+I*(-5.54145016927392E-01):e := -4.03543941203378E-01+I*(4.38583319639411E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.25139465912594E-01+I*(2.78878486337697E-01):b := 6.20103701042415E-01+I*(-1.09159029566538E+00):c := 2.82121776014402E-01+I*(6.42838482873534E-01):d := -2.27594354148182E-01+I*(-8.28107144833246E-01):e := -2.57558516586633E-01+I*(2.92680114326175E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.26982026984441E-01+I*(5.53452803551940E-01):b := 6.01695328754850E-01+I*(-7.38667561095177E-01):c := 5.03484267227227E-01+I*(4.40197903857215E-01):d := -1.94652008778187E-01+I*(-7.57872078786281E-01):e := -2.23472735889110E-01+I*(2.42611705381368E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.28504985923076E-01+I*(8.29252069872826E-01):b := 3.60739336498677E-01+I*(-4.80145735048264E-01):c := 8.03312626947182E-01+I*(4.27255280952301E-01):d := -2.14562938384700E-01+I*(-6.82893965291061E-01):e := -1.80658689782209E-01+I*(2.28101775851277E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.42131553084843E-02+I*(9.77226743421394E-01):b := 9.98171097812206E-03+I*(-4.36990053082049E-01):c := 1.04131383344026E+00+I*(6.10066611257232E-01):d := -2.78010597719501E-01+I*(-6.38255896940911E-01):e := -1.43536261344483E-01+I*(2.34699896043631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.12922769778709E-01+I*(9.28137829888960E-01):b := -2.86454156588963E-01+I*(-6.29393538410504E-01):c := 1.10612447709956E+00+I*(9.03092441600709E-01):d := -3.55307121837649E-01+I*(-6.44844522013736E-01):e := -1.14063517045574E-01+I*(2.55896476736376E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.02533420227024E-01+I*(7.04954577479852E-01):b := -3.89862629250244E-01+I*(-9.67328461921892E-01):c := 9.67418937466844E-01+I*(1.16922272934567E+00):d := -4.10284608049086E-01+I*(-6.99576949613551E-01):e := -9.52721458061123E-02+I*(2.91776481282173E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04324176021013E-01+I*(4.12106910401853E-01):b := -2.51857733390351E-01+I*(-1.29267131717691E+00):c := 6.90099078076608E-01+I*(1.28393215514755E+00):d := -4.17218479548781E-01+I*(-7.76843268583224E-01):e := -9.92947292336288E-02+I*(3.43281246333216E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.17457122622635E-01+I*(1.86621506720044E-01):b := 6.29865064642990E-02+I*(-1.45319056641866E+00):c := 4.03925943204475E-01+I*(1.19354690382039E+00):d := -3.72864300800630E-01+I*(-8.40489709557365E-01):e := -1.51352717276980E-01+I*(3.90902646946852E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.93694311129558E-02+I*(1.34005492808266E-01):b := 4.07350971381754E-01+I*(-1.37377746895418E+00):c := 2.42803123117240E-01+I*(9.40359238980348E-01):d := -2.97975884982680E-01+I*(-8.60735395452771E-01):e := -2.35433010613046E-01+I*(3.70133286605826E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.93201520631313E-02+I*(3.41465502761257E-01):b := 6.54525928842270E-01+I*(-9.79785490541988E-01):c := 4.09111726130381E-01+I*(8.05745238797810E-01):d := -2.13102286474298E-02+I*(-1.05523952617401E+00):e := -1.64104057512661E-01+I*(3.12270072158154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.25224090087148E-02+I*(6.16039819975500E-01):b := 6.36117556554704E-01+I*(-6.26862755971787E-01):c := 6.30474217343207E-01+I*(6.03104659781491E-01):d := 1.16321167225662E-02+I*(-9.85004460127044E-01):e := -1.56357049522820E-01+I*(2.62149449096228E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.59546320526494E-02+I*(8.91839086296386E-01):b := 3.95161564298531E-01+I*(-3.68340929924874E-01):c := 9.30302577063162E-01+I*(5.90162036876577E-01):d := -8.27881288394719E-03+I*(-9.10026346631823E-01):e := -1.27067378859400E-01+I*(2.36928639592775E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.78672773284210E-01+I*(1.03981375984495E+00):b := 4.44039387779767E-02+I*(-3.25185247958658E-01):c := 1.16830378355624E+00+I*(7.72973367181508E-01):d := -7.17264722187485E-02+I*(-8.65388278281673E-01):e := -9.57019280268920E-02+I*(2.31894034297093E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67382387754435E-01+I*(9.90724846312520E-01):b := -2.52031928789108E-01+I*(-5.17588733287113E-01):c := 1.23311442721554E+00+I*(1.06599919752498E+00):d := -1.49022996336897E-01+I*(-8.71976903354499E-01):e := -6.76057929852047E-02+I*(2.41204019496246E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.56993038202750E-01+I*(7.67541593903412E-01):b := -3.55440401450390E-01+I*(-8.55523656798501E-01):c := 1.09440888758282E+00+I*(1.33212948526994E+00):d := -2.04000482548333E-01+I*(-9.26709330954313E-01):e := -4.55465851999357E-02+I*(2.63811218762929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.58783793996739E-01+I*(4.74693926825413E-01):b := -2.17435505590497E-01+I*(-1.18086651205352E+00):c := 8.17089028192588E-01+I*(1.44683891107182E+00):d := -2.10934354048028E-01+I*(-1.00397564992399E+00):e := -3.69721281870429E-02+I*(3.01088145214885E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.71916740598361E-01+I*(2.49208523143604E-01):b := 9.74087342641535E-02+I*(-1.34138576129527E+00):c := 5.30915893320455E-01+I*(1.35645365974467E+00):d := -1.66580175299877E-01+I*(-1.06762209089813E+00):e := -5.97776762131639E-02+I*(3.45730418336654E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.83829049088682E-01+I*(1.96592509231826E-01):b := 4.41773199181608E-01+I*(-1.26197266383079E+00):c := 3.69793073233219E-01+I*(1.10326599490462E+00):d := -9.16917594819266E-02+I*(-1.08786777679353E+00):e := -1.21013518245616E-01+I*(3.57922009558483E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.64477687095926E-01+I*(2.25846449303554E-01):b := 6.09028141731391E-01+I*(-8.72011859335661E-01):c := 4.01677227506331E-01+I*(1.01216662040940E+00):d := 2.82710459880519E-01+I*(-1.09663614480557E+00):e := -8.40385069369399E-02+I*(3.48028962902798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.62635126024079E-01+I*(5.00420766517798E-01):b := 5.90619769443825E-01+I*(-5.19089124765460E-01):c := 6.23039718719156E-01+I*(8.09526041393085E-01):d := 3.15652805250515E-01+I*(-1.02640107875861E+00):e := -1.00039027862340E-01+I*(2.97565680014055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.61112167085444E-01+I*(7.76220032838684E-01):b := 3.49663777187652E-01+I*(-2.60567298718547E-01):c := 9.22868078439111E-01+I*(7.96583418488171E-01):d := 2.95741875644002E-01+I*(-9.51422965263388E-01):e := -8.21106162406505E-02+I*(2.61257852680083E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.13830308317005E-01+I*(9.24194706387252E-01):b := -1.09384833290276E-03+I*(-2.17411616752331E-01):c := 1.16086928493218E+00+I*(9.79394748793102E-01):d := 2.32294216309201E-01+I*(-9.06784896913238E-01):e := -5.40344038279882E-02+I*(2.45131810384863E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.02539922787230E-01+I*(8.75105792854817E-01):b := -2.97529715899987E-01+I*(-4.09815102080786E-01):c := 1.22567992859149E+00+I*(1.27242057913658E+00):d := 1.54997692191053E-01+I*(-9.13373521986063E-01):e := -2.50002079422614E-02+I*(2.44382674539405E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.92150573235545E-01+I*(6.51922540445710E-01):b := -4.00938188561269E-01+I*(-7.47750025592174E-01):c := 1.08697438895877E+00+I*(1.53855086688154E+00):d := 1.00020205979616E-01+I*(-9.68105949585878E-01):e := 1.82840193882456E-03+I*(2.57285133693551E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.93941329029534E-01+I*(3.59074873367711E-01):b := -2.62933292701376E-01+I*(-1.07309288084719E+00):c := 8.09654529568538E-01+I*(1.65326029268342E+00):d := 9.30863344799206E-02+I*(-1.04537226855555E+00):e := 2.14877674532099E-02+I*(2.85938192954969E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.07074275631155E-01+I*(1.33589469685902E-01):b := 5.19109471532740E-02+I*(-1.23361213008894E+00):c := 5.23481394696404E-01+I*(1.56287504135626E+00):d := 1.37440513228072E-01+I*(-1.10901870952969E+00):e := 1.94728816955309E-02+I*(3.30622990078102E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.18986584121476E-01+I*(8.09734557741236E-02):b := 3.96275412070728E-01+I*(-1.15419903262446E+00):c := 3.62358574609169E-01+I*(1.30968737651622E+00):d := 2.12328929046022E-01+I*(-1.12926439542510E+00):e := -2.49653148220625E-02+I*(3.66902088834145E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70300315059058E-01+I*(-1.38792339599025E-02):b := 5.04899259950537E-01+I*(-8.18697881858330E-01):c := 2.63296964673692E-01+I*(1.16551576913414E+00):d := 5.42213052459848E-01+I*(-9.32927062798063E-01):e := -2.57588385232334E-03+I*(4.08759839458049E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.68457753987212E-01+I*(2.60695083254340E-01):b := 4.86490887662972E-01+I*(-4.65775147288128E-01):c := 4.84659455886517E-01+I*(9.62875190117817E-01):d := 5.75155397829845E-01+I*(-8.62691996751098E-01):e := -4.86461493315869E-02+I*(3.56919989266818E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.66934795048576E-01+I*(5.36494349575227E-01):b := 2.45534895406799E-01+I*(-2.07253321241215E-01):c := 7.84487815606472E-01+I*(9.49932567212903E-01):d := 5.55244468223331E-01+I*(-7.87713883255877E-01):e := -4.31286704431812E-02+I*(3.04957129232681E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.19652936280137E-01+I*(6.84469023123795E-01):b := -1.05222730113756E-01+I*(-1.64097639274999E-01):c := 1.02248902209955E+00+I*(1.13274389751783E+00):d := 4.91796808888531E-01+I*(-7.43075814905727E-01):e := -1.65133631997662E-02+I*(2.75121116704710E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.08362550750362E-01+I*(6.35380109591360E-01):b := -4.01658597680840E-01+I*(-3.56501124603454E-01):c := 1.08729966575885E+00+I*(1.42576972786131E+00):d := 4.14500284770383E-01+I*(-7.49664439978553E-01):e := 1.57472651730382E-02+I*(2.63548251310691E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09797320119868E+00+I*(4.12196857182253E-01):b := -5.05067070342122E-01+I*(-6.94436048114842E-01):c := 9.48594126126134E-01+I*(1.69190001560627E+00):d := 3.59522798558946E-01+I*(-8.04396867578367E-01):e := 4.93393662753735E-02+I*(2.67299864599494E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09976395699267E+00+I*(1.19349190104253E-01):b := -3.67062174482229E-01+I*(-1.01977890336986E+00):c := 6.71274266735898E-01+I*(1.80660944140815E+00):d := 3.52588927059250E-01+I*(-8.81663186548040E-01):e := 8.11448500534773E-02+I*(2.88833563671528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.12896903594287E-01+I*(-1.06136213577555E-01):b := -5.22179346275792E-02+I*(-1.18029815261161E+00):c := 3.85101131863765E-01+I*(1.71622419008099E+00):d := 3.96943105807402E-01+I*(-9.45309627522181E-01):e := 9.96456790134892E-02+I*(3.34560964900550E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.24809212084608E-01+I*(-1.58752227489334E-01):b := 2.92146530289876E-01+I*(-1.10088505514713E+00):c := 2.23978311776529E-01+I*(1.46303652524095E+00):d := 4.71831521625352E-01+I*(-9.65555313417587E-01):e := 7.36943142331616E-02+I*(3.95384230021591E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.97272452241073E-01+I*(-2.65541235575944E-01):b := 3.90862344548586E-01+I*(-8.44789760690496E-01):c := 5.87206005371677E-02+I*(1.19403891399776E+00):d := 6.35773401972628E-01+I*(-6.40713579046573E-01):e := 8.79583386341475E-02+I*(5.32210230958618E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.95429891169226E-01+I*(9.03308163829906E-03):b := 3.72453972261020E-01+I*(-4.91867026120294E-01):c := 2.80083091749993E-01+I*(9.91398334981437E-01):d := 6.68715747342624E-01+I*(-5.70478512999608E-01):e := -1.25602135067040E-02+I*(4.68415266212777E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.93906932230590E-01+I*(2.84832347959185E-01):b := 1.31497980004847E-01+I*(-2.33345200073381E-01):c := 5.79911451469948E-01+I*(9.78455712076523E-01):d := 6.48804817736110E-01+I*(-4.95500399504388E-01):e := -2.02437347535198E-02+I*(3.83915022183522E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.46625073462151E-01+I*(4.32807021507754E-01):b := -2.19259645515707E-01+I*(-1.90189518107165E-01):c := 8.17912657963022E-01+I*(1.16126704238145E+00):d := 5.85357158401309E-01+I*(-4.50862331154238E-01):e := 1.11008117917678E-02+I*(3.32475958715287E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.35334687932376E-01+I*(3.83718107975319E-01):b := -5.15695513082792E-01+I*(-3.82593003435620E-01):c := 8.82723301622331E-01+I*(1.45429287272493E+00):d := 5.08060634283161E-01+I*(-4.57450956227064E-01):e := 5.27591682417220E-02+I*(3.07035225201362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02494533838069E+00+I*(1.60534855566212E-01):b := -6.19103985744074E-01+I*(-7.20527926947008E-01):c := 7.44017761989611E-01+I*(1.72042316046989E+00):d := 4.53083148071724E-01+I*(-5.12183383826878E-01):e := 9.88028656961753E-02+I*(3.00824307596455E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02673609417468E+00+I*(-1.32312811511788E-01):b := -4.81099089884181E-01+I*(-1.04587078220203E+00):c := 4.66697902599375E-01+I*(1.83513258627177E+00):d := 4.46149276572029E-01+I*(-5.89449702796551E-01):e := 1.48632130540074E-01+I*(3.15938244346313E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.39869040776302E-01+I*(-3.57798215193597E-01):b := -1.66254850029531E-01+I*(-1.20639003144377E+00):c := 1.80524767727242E-01+I*(1.74474733494461E+00):d := 4.90503455320180E-01+I*(-6.53096143770691E-01):e := 1.95152092607765E-01+I*(3.65780594372568E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.51781349266623E-01+I*(-4.10414229105375E-01):b := 1.78109614887924E-01+I*(-1.12697693397930E+00):c := 1.94019476400060E-02+I*(1.49155967010457E+00):d := 5.65391871138131E-01+I*(-6.73341829666097E-01):e := 1.96478094650858E-01+I*(4.64200781803984E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.95646472687940E-02+I*(-4.11384108076823E-01):b := 3.20276535621250E-01+I*(-9.38078815747658E-01):c := -1.16328310510729E-01+I*(1.08438975851913E+00):d := 5.19613581074364E-01+I*(-3.56725630189551E-01):e := 1.10330647303384E-01+I*(8.53883782765432E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.22779138030524E-02+I*(-1.36809790862579E-01):b := 3.01868163333685E-01+I*(-5.85156081177455E-01):c := 1.05034180702096E-01+I*(8.81749179502811E-01):d := 5.52555926444360E-01+I*(-2.86490564142585E-01):e := -9.72993390768994E-02+I*(6.72637964749345E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.61991272583119E-02+I*(1.38989475458307E-01):b := 6.09121710775123E-02+I*(-3.26634255130542E-01):c := 4.04862540422051E-01+I*(8.68806556597897E-01):d := 5.32644996837847E-01+I*(-2.11512450647365E-01):e := -7.69843893511190E-02+I*(5.09080341065757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.28917268489873E-01+I*(2.86964149006875E-01):b := -2.89845454443043E-01+I*(-2.83478573164327E-01):c := 6.42863746915124E-01+I*(1.05161788690283E+00):d := 4.69197337503046E-01+I*(-1.66874382297215E-01):e := -9.80454152443523E-03+I*(4.29463012009617E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.17626882960097E-01+I*(2.37875235474441E-01):b := -5.86281322010127E-01+I*(-4.75882058492781E-01):c := 7.07674390574432E-01+I*(1.34464371724631E+00):d := 3.91900813384898E-01+I*(-1.73463007370040E-01):e := 6.15925004798277E-02+I*(3.92517440289079E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.07237533408413E-01+I*(1.46919830653331E-02):b := -6.89689794671409E-01+I*(-8.13816982004170E-01):c := 5.68968850941713E-01+I*(1.61077400499126E+00):d := 3.36923327173461E-01+I*(-2.28195434969854E-01):e := 1.36613264413571E-01+I*(3.81477981704855E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.09028289202402E-01+I*(-2.78155684012666E-01):b := -5.51684898811517E-01+I*(-1.13915983725919E+00):c := 2.91648991551478E-01+I*(1.72548343079314E+00):d := 3.29989455673765E-01+I*(-3.05461753939528E-01):e := 2.21982421877286E-01+I*(3.98757797981750E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.22161235804024E-01+I*(-5.03641087694476E-01):b := -2.36840658956866E-01+I*(-1.29967908650093E+00):c := 5.47585667934372E-03+I*(1.63509817946599E+00):d := 3.74343634421917E-01+I*(-3.69108194913668E-01):e := 3.19890631790473E-01+I*(4.72693064242397E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.34073544294344E-01+I*(-5.56257101606254E-01):b := 1.07523805960589E-01+I*(-1.22026598903646E+00):c := -1.55646963407892E-01+I*(1.38191051462594E+00):d := 4.49232050239867E-01+I*(-3.89353880809074E-01):e := 3.63259160113934E-01+I*(6.73872433110569E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.80955198358508E-01+I*(-3.83166350556396E-01):b := 3.26169717639516E-01+I*(-1.05491406137621E+00):c := -1.79942437538746E-01+I*(8.87874361161331E-01):d := 2.48086060935965E-01+I*(-2.13844333671683E-01):e := -5.78109463023867E-01+I*(1.04735074625834E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.82797759430355E-01+I*(-1.08592033342153E-01):b := 3.07761345351950E-01+I*(-7.01991326806006E-01):c := 4.14200536740792E-02+I*(6.85233782145012E-01):d := 2.81028406305961E-01+I*(-1.43609267624718E-01):e := -4.60889477759549E-01+I*(6.25532612493555E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.84320718368990E-01+I*(1.67207232978733E-01):b := 6.68053530957780E-02+I*(-4.43469500759093E-01):c := 3.41248413394034E-01+I*(6.72291159240097E-01):d := 2.61117476699448E-01+I*(-6.86311541294973E-02):e := -2.84669208308327E-01+I*(5.06530025919609E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.83974228625705E-02+I*(3.15181906527302E-01):b := -2.83952272424777E-01+I*(-4.00313818792878E-01):c := 5.79249619887108E-01+I*(8.55102489545029E-01):d := 1.97669817364647E-01+I*(-2.39930857793473E-02):e := -1.51305031692474E-01+I*(4.76256991644691E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.57107037332795E-01+I*(2.66092992994867E-01):b := -5.80388139991861E-01+I*(-5.92717304121333E-01):c := 6.44060263546415E-01+I*(1.14812831988851E+00):d := 1.20373293246499E-01+I*(-3.05817108521727E-02):e := -3.78508319342663E-02+I*(4.80961990244403E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.46717687781111E-01+I*(4.29097405857596E-02):b := -6.83796612653144E-01+I*(-9.30652227632721E-01):c := 5.05354723913696E-01+I*(1.41425860763346E+00):d := 6.53958070350618E-02+I*(-8.53141384519871E-02):e := 7.54632582467001E-02+I*(5.14317962916907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.48508443575099E-01+I*(-2.49937926492240E-01):b := -5.45791716793251E-01+I*(-1.25599508288774E+00):c := 2.28034864523461E-01+I*(1.52896803343534E+00):d := 5.84619355353665E-02+I*(-1.62580457421661E-01):e := 2.05485248929911E-01+I*(5.98617494531668E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.61641390176721E-01+I*(-4.75423330174048E-01):b := -2.30947476938600E-01+I*(-1.41651433212949E+00):c := -5.81382703486725E-02+I*(1.43858278210819E+00):d := 1.02816114283518E-01+I*(-2.26226898395801E-01):e := 3.44156346095009E-01+I*(8.26716760345926E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.35536986670417E-02+I*(-5.28039344085827E-01):b := 1.13416987978854E-01+I*(-1.33710123466501E+00):c := -2.19261090435908E-01+I*(1.18539511726814E+00):d := 1.77704530101469E-01+I*(-2.46472584291207E-01):e := 1.24845835574585E-01+I*(1.35883028210929E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.05943902980058E-01+I*(-2.01324776388991E-01):b := 5.82631510757286E-01+I*(-9.48625266893286E-01):c := -5.61374774903341E-01+I*(7.69352520020132E-01):d := 1.78865264112269E-01+I*(-2.80001099206918E-01):e := -1.80645425235803E-01+I*(8.30996203479044E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.07786464051905E-01+I*(7.32495408252520E-02):b := 5.64223138469721E-01+I*(-5.95702532323084E-01):c := -3.40012283690516E-01+I*(5.66711941003813E-01):d := 2.11807609482265E-01+I*(-2.09766033159952E-01):e := -2.45320094735429E-01+I*(5.85202734230206E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09309422990540E-01+I*(3.49048807146138E-01):b := 3.23267146213548E-01+I*(-3.37180706276171E-01):c := -4.01839239705602E-02+I*(5.53769318098899E-01):d := 1.91896679875752E-01+I*(-1.34787919664732E-01):e := -1.65954920943047E-01+I*(4.61854890543916E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.65912817589797E-02+I*(4.97023480694707E-01):b := -2.74904793070070E-02+I*(-2.94025024309956E-01):c := 1.97817282522513E-01+I*(7.36580648403830E-01):d := 1.28449020540950E-01+I*(-9.01498513145820E-02):e := -8.05672922681303E-02+I*(4.14548827559894E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.32118332711245E-01+I*(4.47934567162272E-01):b := -3.23926346874092E-01+I*(-4.86428509638411E-01):c := 2.62627926181821E-01+I*(1.02960647874731E+00):d := 5.11524964228024E-02+I*(-9.67384763874074E-02):e := -1.37209670239314E-03+I*(4.02633332298531E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.21728983159560E-01+I*(2.24751314753164E-01):b := -4.27334819535374E-01+I*(-8.24363433149799E-01):c := 1.23922386549101E-01+I*(1.29573676649226E+00):d := -3.82498978863447E-03+I*(-1.51470903987222E-01):e := 7.77716465905901E-02+I*(4.16397644830415E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23519738953550E-01+I*(-6.80963523248352E-02):b := -2.89329923675481E-01+I*(-1.14970628840482E+00):c := -1.53397472841134E-01+I*(1.41044619229415E+00):d := -1.07588612883299E-02+I*(-2.28737222956896E-01):e := 1.62733859548995E-01+I*(4.66309674622759E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.36652685555171E-01+I*(-2.93581756006644E-01):b := 2.55143161791694E-02+I*(-1.31022553764656E+00):c := -4.39570607713267E-01+I*(1.32006094096699E+00):d := 3.35953174598217E-02+I*(-2.92383663931035E-01):e := 2.39310858679946E-01+I*(5.94121285472707E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.14350059545082E-02+I*(-3.46197769918422E-01):b := 3.69878781096624E-01+I*(-1.23081244018209E+00):c := -6.00693427800503E-01+I*(1.06687327612695E+00):d := 1.08483733277772E-01+I*(-3.12629349826441E-01):e := 1.62104281820343E-01+I*(8.40563216094824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23393633040574E-01+I*(6.01371495695892E-02):b := 6.98715106795501E-01+I*(-9.63109843042452E-01):c := -3.78891365231393E-01+I*(6.72580293887164E-01):d := -8.99560351741690E-03+I*(-5.22592429432376E-01):e := -2.37121074565492E-01+I*(5.05959515433477E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.25236194112421E-01+I*(3.34711466783832E-01):b := 6.80306734507935E-01+I*(-6.10187108472250E-01):c := -1.57528874018567E-01+I*(4.69939714870844E-01):d := 2.39467418525792E-02+I*(-4.52357363385410E-01):e := -2.25728334337256E-01+I*(3.88303529445720E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.26759153051057E-01+I*(6.10510733104718E-01):b := 4.39350742251762E-01+I*(-3.51665282425337E-01):c := 1.42299485701388E-01+I*(4.56997091965930E-01):d := 4.03581224606596E-03+I*(-3.77379249890190E-01):e := -1.67783075729211E-01+I*(3.34392868742710E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.40410118194963E-02+I*(7.58485406653287E-01):b := 8.85931167312073E-02+I*(-3.08509600459122E-01):c := 3.80300692194461E-01+I*(6.39808422270861E-01):d := -5.94118470887356E-02+I*(-3.32741181540040E-01):e := -1.09985698685714E-01+I*(3.19845263296615E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.14668602650729E-01+I*(7.09396493120852E-01):b := -2.07842750835877E-01+I*(-5.00913085787577E-01):c := 4.45111335853769E-01+I*(9.32834252614338E-01):d := -1.36708371206884E-01+I*(-3.39329806612865E-01):e := -5.75653857459076E-02+I*(3.28309025151178E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.04279253099044E-01+I*(4.86213240711745E-01):b := -3.11251223497159E-01+I*(-8.38848009298965E-01):c := 3.06405796221050E-01+I*(1.19896454035930E+00):d := -1.91685857418321E-01+I*(-3.94062234212680E-01):e := -9.77397499746579E-03+I*(3.57894208653125E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.06070008893033E-01+I*(1.93365573633745E-01):b := -1.73246327637266E-01+I*(-1.16419086455398E+00):c := 2.90859368308139E-02+I*(1.31367396616118E+00):d := -1.98619728918016E-01+I*(-4.71328553182354E-01):e := 2.76063276241098E-02+I*(4.17794282136650E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.19202955494655E-01+I*(-3.21198300480635E-02):b := 1.41597912217384E-01+I*(-1.32471011379573E+00):c := -2.57087198041320E-01+I*(1.22328871483402E+00):d := -1.54265550169864E-01+I*(-5.34974994156494E-01):e := 1.99586371968487E-02+I*(5.20166670552848E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.88847360150244E-02+I*(-8.47358439598416E-02):b := 4.85962377134839E-01+I*(-1.24529701633125E+00):c := -4.18210018128555E-01+I*(9.70101049993977E-01):d := -7.93771343519137E-02+I*(-5.55220680051900E-01):e := -1.06736604093911E-01+I*(5.98847184884764E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.68696415376405E-01+I*(2.71645075312620E-01):b := 7.96950806558088E-01+I*(-8.99588574891233E-01):c := -1.76896975370737E-01+I*(7.15746542520231E-01):d := 3.02932404165192E-03+I*(-8.29182807957753E-01):e := -1.39979158995289E-01+I*(3.81703544746503E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70538976448251E-01+I*(5.46219392526863E-01):b := 7.78542434270522E-01+I*(-5.46665840321031E-01):c := 4.44655158420888E-02+I*(5.13105963503911E-01):d := 3.59716694116482E-02+I*(-7.58947741910788E-01):e := -1.45585499826105E-01+I*(3.15417478878596E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.72061935386886E-01+I*(8.22018658847749E-01):b := 5.37586442014349E-01+I*(-2.88144014274117E-01):c := 3.44293875562044E-01+I*(5.00163340598997E-01):d := 1.60607398051352E-02+I*(-6.83969628415568E-01):e := -1.15585520752508E-01+I*(2.76608826237730E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.06562058446744E-02+I*(9.69993332396317E-01):b := 1.86828816493795E-01+I*(-2.44988332307902E-01):c := 5.82295082055117E-01+I*(6.82974670903929E-01):d := -4.73869195296661E-02+I*(-6.39331560065418E-01):e := -7.91993376018676E-02+I*(2.63134333234590E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.69365820314899E-01+I*(9.20904418863883E-01):b := -1.09607051073290E-01+I*(-4.37391817636357E-01):c := 6.47105725714425E-01+I*(9.76000501247405E-01):d := -1.24683443647814E-01+I*(-6.45920185138243E-01):e := -4.43807339818964E-02+I*(2.67062207398272E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.58976470763214E-01+I*(6.97721166454775E-01):b := -2.13015523734572E-01+I*(-7.75326741147745E-01):c := 5.08400186081705E-01+I*(1.24213078899236E+00):d := -1.79660929859251E-01+I*(-7.00652612738057E-01):e := -1.34769095821046E-02+I*(2.86657014034430E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.60767226557203E-01+I*(4.04873499376775E-01):b := -7.50106278746787E-02+I*(-1.10066959640276E+00):c := 2.31080326691470E-01+I*(1.35684021479424E+00):d := -1.86594801358946E-01+I*(-7.77918931707732E-01):e := 7.42174814305121E-03+I*(3.25364887967932E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.73900173158825E-01+I*(1.79388095694967E-01):b := 2.39833611979972E-01+I*(-1.26118884564451E+00):c := -5.50928081806635E-02+I*(1.26645496346709E+00):d := -1.42240622610795E-01+I*(-8.41565372681871E-01):e := -2.01955738203581E-03+I*(3.83367459635499E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.58124816491453E-02+I*(1.26772081783189E-01):b := 5.84198076897426E-01+I*(-1.18177574818003E+00):c := -2.16215628267899E-01+I*(1.01326729862704E+00):d := -6.73522067928444E-02+I*(-8.61811058577277E-01):e := -6.87829267580151E-02+I*(4.22217494560906E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.57632025993205E-02+I*(3.34232091736180E-01):b := 8.31373034357942E-01+I*(-7.87783769767843E-01):c := -4.99070252547568E-02+I*(8.78653298444506E-01):d := 2.09313449542404E-01+I*(-1.05631518929852E+00):e := -5.48300597126776E-02+I*(3.36725797103572E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.60793584725261E-02+I*(6.08806408950423E-01):b := 8.12964662070377E-01+I*(-4.34861035197641E-01):c := 1.71455465958069E-01+I*(6.76012719428187E-01):d := 2.42255794912400E-01+I*(-9.86080123251551E-01):e := -7.61070899502151E-02+I*(2.92985001373396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.23976825888387E-02+I*(8.84605675271309E-01):b := 5.72008669814204E-01+I*(-1.76339209150727E-01):c := 4.71283825678024E-01+I*(6.63070096523272E-01):d := 2.22344865305888E-01+I*(-9.11102009756330E-01):e := -6.39460451910861E-02+I*(2.57207448800917E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.35115823820400E-01+I*(1.03258034881988E+00):b := 2.21251044293649E-01+I*(-1.33183527184512E-01):c := 7.09285032171098E-01+I*(8.45881426828204E-01):d := 1.58897205971086E-01+I*(-8.66463941406180E-01):e := -3.95789992293040E-02+I*(2.39245915688556E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.23825438290625E-01+I*(9.83491435287443E-01):b := -7.51848232734355E-02+I*(-3.25587012512967E-01):c := 7.74095675830406E-01+I*(1.13890725717168E+00):d := 8.16006818529385E-02+I*(-8.73052566479006E-01):e := -1.28174811247733E-02+I*(2.35843499640613E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.13436088738940E-01+I*(7.60308182878335E-01):b := -1.78593295934717E-01+I*(-6.63521936024355E-01):c := 6.35390136197685E-01+I*(1.40503754491664E+00):d := 2.66231956415018E-02+I*(-9.27784994078820E-01):e := 1.28051021064278E-02+I*(2.45358899577587E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.15226844532929E-01+I*(4.67460515800335E-01):b := -4.05884000748246E-02+I*(-9.88864791279372E-01):c := 3.58070276807450E-01+I*(1.51974697071852E+00):d := 1.96893241418060E-02+I*(-1.00505131304849E+00):e := 3.28729206392719E-02+I*(2.69538517142297E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.28359791134550E-01+I*(2.41975112118527E-01):b := 2.74255839779826E-01+I*(-1.14938404052112E+00):c := 7.18971419353164E-02+I*(1.42936171939136E+00):d := 6.40435028899577E-02+I*(-1.06869775402263E+00):e := 3.50769517881598E-02+I*(3.09286734524238E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.40272099624871E-01+I*(1.89359098206749E-01):b := 6.18620304697280E-01+I*(-1.06997094305664E+00):c := -8.92256781519190E-02+I*(1.17617405455132E+00):d := 1.38931918707908E-01+I*(-1.08894343991804E+00):e := -1.09173194414603E-05+I*(3.45899718743470E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.20920737632115E-01+I*(2.18613038278477E-01):b := 7.85875247247063E-01+I*(-6.80010138561515E-01):c := -5.73415238788076E-02+I*(1.08507468005610E+00):d := 5.13334138070354E-01+I*(-1.09771180793008E+00):e := 1.99220678583529E-02+I*(3.21477526986839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.19078176560269E-01+I*(4.93187355492721E-01):b := 7.67466874959497E-01+I*(-3.27087403991313E-01):c := 1.64020967334018E-01+I*(8.82434101039781E-01):d := 5.46276483440350E-01+I*(-1.02747674188311E+00):e := -1.44245122052851E-02+I*(2.93143231737438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.17555217621633E-01+I*(7.68986621813607E-01):b := 5.26510882703325E-01+I*(-6.85655779443999E-02):c := 4.63849327053973E-01+I*(8.69491478134867E-01):d := 5.26365553833837E-01+I*(-9.52498628387894E-01):e := -1.64625776690020E-02+I*(2.57528711947227E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.70273358853195E-01+I*(9.16961295362175E-01):b := 1.75753257182770E-01+I*(-2.54098959781844E-02):c := 7.01850533547047E-01+I*(1.05230280843980E+00):d := 4.62917894499036E-01+I*(-9.07860560037745E-01):e := -5.43968977524261E-04+I*(2.33964749285921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.58982973323419E-01+I*(8.67872381829741E-01):b := -1.20682610384315E-01+I*(-2.17813381306639E-01):c := 7.66661177206355E-01+I*(1.34532863878327E+00):d := 3.85621370380887E-01+I*(-9.14449185110570E-01):e := 2.18405935959888E-02+I*(2.23431523749908E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.04859362377173E+00+I*(6.44689129420633E-01):b := -2.24091083045597E-01+I*(-5.55748304818028E-01):c := 6.27955637573635E-01+I*(1.61145892652823E+00):d := 3.30643884169451E-01+I*(-9.69181612710384E-01):e := 4.60626216104140E-02+I*(2.24736568534926E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05038437956572E+00+I*(3.51841462342633E-01):b := -8.60861871857041E-02+I*(-8.81091160073044E-01):c := 3.50635778183399E-01+I*(1.72616835233011E+00):d := 3.23710012669755E-01+I*(-1.04644793168006E+00):e := 6.87100188625349E-02+I*(2.39244215249964E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.63517326167345E-01+I*(1.26356058660824E-01):b := 2.28758052668946E-01+I*(-1.04161040931479E+00):c := 6.44626433112653E-02+I*(1.63578310100296E+00):d := 3.68064191417907E-01+I*(-1.11009437265420E+00):e := 8.13846001120767E-02+I*(2.69749031371219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.75429634657665E-01+I*(7.37400447490465E-02):b := 5.73122517586401E-01+I*(-9.62197311850317E-01):c := -9.66601767759695E-02+I*(1.38259543616291E+00):d := 4.42952607235857E-01+I*(-1.13034005854960E+00):e := 6.61105419645510E-02+I*(3.08771516235552E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26743365595247E-01+I*(-2.11126449849800E-02):b := 6.81746365466210E-01+I*(-6.26696161084183E-01):c := -1.95721786711447E-01+I*(1.23842382878083E+00):d := 7.72836730649683E-01+I*(-9.34002725922569E-01):e := 9.56370920031878E-02+I*(3.25227844622421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.24900804523401E-01+I*(2.53461672229263E-01):b := 6.63337993178644E-01+I*(-2.73773426513981E-01):c := 2.56407045013781E-02+I*(1.03578324976451E+00):d := 8.05779076019680E-01+I*(-8.63767659875604E-01):e := 4.70479846576681E-02+I*(3.11947444879525E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23377845584765E-01+I*(5.29260938550149E-01):b := 4.22382000922471E-01+I*(-1.52516004670683E-02):c := 3.25469064221334E-01+I*(1.02284062685960E+00):d := 7.85868146413166E-01+I*(-7.88789546380384E-01):e := 2.99878001391273E-02+I*(2.74613620318727E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.76095986816326E-01+I*(6.77235612098718E-01):b := 7.16243754019165E-02+I*(2.79040814991474E-02):c := 5.63470270714407E-01+I*(1.20565195716453E+00):d := 7.22420487078365E-01+I*(-7.44151478030234E-01):e := 3.83342052740280E-02+I*(2.43629045322830E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.64805601286551E-01+I*(6.28146698566283E-01):b := -2.24811492165168E-01+I*(-1.64499403829308E-01):c := 6.28280914373715E-01+I*(1.49867778750801E+00):d := 6.45123962960217E-01+I*(-7.50740103103059E-01):e := 5.80405224152917E-02+I*(2.25158014795025E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15441625173487E+00+I*(4.04963446157176E-01):b := -3.28219964826450E-01+I*(-5.02434327340695E-01):c := 4.89575374740995E-01+I*(1.76480807525296E+00):d := 5.90146476748780E-01+I*(-8.05472530702874E-01):e := 8.27689572778309E-02+I*(2.18556651939211E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15620700752886E+00+I*(1.12115779079177E-01):b := -1.90215068966557E-01+I*(-8.27777182595713E-01):c := 2.12255515350760E-01+I*(1.87951750105485E+00):d := 5.83212605249085E-01+I*(-8.82738849672548E-01):e := 1.09549835102620E-01+I*(2.25009971454447E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.69339954130477E-01+I*(-1.13369624602633E-01):b := 1.24629170888093E-01+I*(-9.88296431837460E-01):c := -7.39176195213742E-02+I*(1.78913224972769E+00):d := 6.27566783997237E-01+I*(-9.46385290646688E-01):e := 1.32537098791151E-01+I*(2.49038264296196E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.81252262620798E-01+I*(-1.65985638514411E-01):b := 4.68993635805548E-01+I*(-9.08883334372985E-01):c := -2.35040439608609E-01+I*(1.53594458488765E+00):d := 7.02455199815187E-01+I*(-9.66630976542093E-01):e := 1.34408110475693E-01+I*(2.91669527732113E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.53715502777262E-01+I*(-2.72774646601022E-01):b := 5.67709450064258E-01+I*(-6.52788039916350E-01):c := -4.00298150847971E-01+I*(1.26694697364445E+00):d := 8.66397080162462E-01+I*(-6.41789242171079E-01):e := 1.84919423294900E-01+I*(3.55833999272718E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.51872941705415E-01+I*(1.79967061322188E-03):b := 5.49301077776692E-01+I*(-2.99865305346147E-01):c := -1.78935659635145E-01+I*(1.06430639462813E+00):d := 8.99339425532458E-01+I*(-5.71554176124114E-01):e := 1.13561797571814E-01+I*(3.61629963701900E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.50349982766780E-01+I*(2.77598936934108E-01):b := 3.08345085520520E-01+I*(-4.13434792992344E-02):c := 1.20892700084810E-01+I*(1.05136377172322E+00):d := 8.79428495925945E-01+I*(-4.96576062628894E-01):e := 7.56596452223145E-02+I*(3.17395354149566E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.03068123998341E-01+I*(4.25573610482677E-01):b := -4.24125400000352E-02+I*(1.81220266698115E-03):c := 3.58893906577884E-01+I*(1.23417510202815E+00):d := 8.15980836591144E-01+I*(-4.51937994278744E-01):e := 7.65832675345356E-02+I*(2.73723370939463E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.91777738468565E-01+I*(3.76484696950241E-01):b := -3.38848407567119E-01+I*(-1.90591282661474E-01):c := 4.23704550237191E-01+I*(1.52720093237163E+00):d := 7.38684312472996E-01+I*(-4.58526619351569E-01):e := 9.58239291473346E-02+I*(2.44325392172275E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08138838891688E+00+I*(1.53301444541134E-01):b := -4.42256880228402E-01+I*(-5.28526206172862E-01):c := 2.84999010604472E-01+I*(1.79333122011658E+00):d := 6.83706826261559E-01+I*(-5.13259046951384E-01):e := 1.23747087266375E-01+I*(2.28457871602377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08317914471087E+00+I*(-1.39546222536865E-01):b := -3.04251984368509E-01+I*(-8.53869061427879E-01):c := 7.67915121423644E-03+I*(1.90804064591847E+00):d := 6.76772954761864E-01+I*(-5.90525365921057E-01):e := 1.57481027466358E-01+I*(2.26702451084695E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.96312091312491E-01+I*(-3.65031626218674E-01):b := 1.05922554861417E-02+I*(-1.01438831066963E+00):c := -2.78493983657898E-01+I*(1.81765539459131E+00):d := 7.21127133510016E-01+I*(-6.54171806895197E-01):e := 1.93622229485951E-01+I*(2.45255662935656E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.08224399802812E-01+I*(-4.17647640130452E-01):b := 3.54956720403596E-01+I*(-9.34975213205151E-01):c := -4.39616803745133E-01+I*(1.56446772975127E+00):d := 7.96015549327965E-01+I*(-6.74417492790603E-01):e := 2.15707287050091E-01+I*(2.94192434902630E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.36007697804983E-01+I*(-4.18617519101899E-01):b := 4.97123641136924E-01+I*(-7.46077094973511E-01):c := -5.75347061895868E-01+I*(1.15729781816583E+00):d := 7.50237259264199E-01+I*(-3.57801293314057E-01):e := 2.97359903370872E-01+I*(4.58250139940032E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.41651367331372E-02+I*(-1.44043201887656E-01):b := 4.78715268849358E-01+I*(-3.93154360403309E-01):c := -3.53984570683042E-01+I*(9.54657239149508E-01):d := 7.83179604634195E-01+I*(-2.87566227267092E-01):e := 1.68019722880012E-01+I*(4.85330264888896E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32642177794501E-01+I*(1.31756064433230E-01):b := 2.37759276593185E-01+I*(-1.34632534356396E-01):c := -5.41562109630871E-02+I*(9.41714616244593E-01):d := 7.63268675027681E-01+I*(-2.12588113771872E-01):e := 9.91574499048617E-02+I*(4.10023773563171E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.85360319026062E-01+I*(2.79730737981799E-01):b := -1.12998348927370E-01+I*(-9.14768523901803E-02):c := 1.83844995529987E-01+I*(1.12452594654953E+00):d := 6.99821015692880E-01+I*(-1.67950045421722E-01):e := 9.95516331156615E-02+I*(3.39693212287259E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.74069933496287E-01+I*(2.30641824449364E-01):b := -4.09434216494454E-01+I*(-2.83880337718635E-01):c := 2.48655639189295E-01+I*(1.41755177689300E+00):d := 6.22524491574732E-01+I*(-1.74538670494548E-01):e := 1.26693956171665E-01+I*(2.93775105988004E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.63680583944602E-01+I*(7.45857204025629E-03):b := -5.12842689155737E-01+I*(-6.21815261230024E-01):c := 1.09950099556575E-01+I*(1.68368206463796E+00):d := 5.67547005363295E-01+I*(-2.29271098094362E-01):e := 1.65487295874115E-01+I*(2.66715831205625E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.65471339738591E-01+I*(-2.85389095037743E-01):b := -3.74837793295844E-01+I*(-9.47158116485041E-01):c := -1.67369759833661E-01+I*(1.79839149043984E+00):d := 5.60613133863600E-01+I*(-3.06537417064036E-01):e := 2.13957984726416E-01+I*(2.56988782863187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.78604286340213E-01+I*(-5.10874498719552E-01):b := -5.99935534411931E-02+I*(-1.10767736572679E+00):c := -4.53542894705795E-01+I*(1.70800623911268E+00):d := 6.04967312611752E-01+I*(-3.70183858038176E-01):e := 2.72518951489919E-01+I*(2.73285556305936E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.90516594830534E-01+I*(-5.63490512631330E-01):b := 2.84370911476261E-01+I*(-1.02826426826231E+00):c := -6.14665714793030E-01+I*(1.45481857427264E+00):d := 6.79855728429702E-01+I*(-3.90429543933581E-01):e := 3.25724242047637E-01+I*(3.40395298699428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.24512147822319E-01+I*(-3.90399761581473E-01):b := 5.03016823155189E-01+I*(-8.62912340602062E-01):c := -6.38961188923884E-01+I*(9.60782420808027E-01):d := 4.78709739125800E-01+I*(-2.14919996796190E-01):e := 3.07835400205605E-01+I*(7.73991555371935E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26354708894165E-01+I*(-1.15825444367230E-01):b := 4.84608450867623E-01+I*(-5.09989606031860E-01):c := -4.17598697711059E-01+I*(7.58141841791708E-01):d := 5.11652084495796E-01+I*(-1.44684930749225E-01):e := 4.16172567501461E-02+I*(7.01823579519695E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.27877667832801E-01+I*(1.59973821953657E-01):b := 2.43652458611450E-01+I*(-2.51467779984947E-01):c := -1.17770337991104E-01+I*(7.45199218886794E-01):d := 4.91741154889282E-01+I*(-6.97068172540041E-02):e := 1.24890893338483E-03+I*(5.30764681766871E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.24840473398760E-01+I*(3.07948495502225E-01):b := -1.07105166909104E-01+I*(-2.08312098018732E-01):c := 1.20230868501970E-01+I*(9.28010549191726E-01):d := 4.28293495554481E-01+I*(-2.50687489038541E-02):e := 4.55475979014222E-02+I*(4.31698348275233E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.13550087868985E-01+I*(2.58859581969790E-01):b := -4.03541034476189E-01+I*(-4.00715583347186E-01):c := 1.85041512161278E-01+I*(1.22103637953520E+00):d := 3.50996971436333E-01+I*(-3.16573739766796E-02):e := 1.05838680891759E-01+I*(3.78557799208910E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.03160738317300E-01+I*(3.56763295606827E-02):b := -5.06949507137471E-01+I*(-7.38650506858575E-01):c := 4.63359725285578E-02+I*(1.48716666728016E+00):d := 2.96019485224896E-01+I*(-8.63898015764937E-02):e := 1.73353211418553E-01+I*(3.51826011219355E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.04951494111289E-01+I*(-2.57171337517316E-01):b := -3.68944611277578E-01+I*(-1.06399336211359E+00):c := -2.30983886861677E-01+I*(1.60187609308204E+00):d := 2.89085613725201E-01+I*(-1.63656120546168E-01):e := 2.52963272244371E-01+I*(3.49182649584248E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.18084440712911E-01+I*(-4.82656741199125E-01):b := -5.41003714229278E-02+I*(-1.22451261135534E+00):c := -5.17157021733811E-01+I*(1.51149084175488E+00):d := 3.33439792473352E-01+I*(-2.27302561520308E-01):e := 3.51591599404381E-01+I*(3.89554884992558E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.29996749203231E-01+I*(-5.35272755110904E-01):b := 2.90264093494527E-01+I*(-1.14509951389086E+00):c := -6.78279841821047E-01+I*(1.25830317691484E+00):d := 4.08328208291303E-01+I*(-2.47548247415713E-01):e := 4.40492481369791E-01+I*(5.36237451347899E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67355564746816E-01+I*(-2.43146784247121E-01):b := 5.94687926067127E-01+I*(-6.87868287390568E-01):c := -9.59867936076522E-01+I*(5.30151767966918E-01):d := 3.56224674169881E-01+I*(-1.32583062125352E-01):e := 5.27806857039394E-01+I*(7.33644072722455E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69198125818663E-01+I*(3.14275329671225E-02):b := 5.76279553779561E-01+I*(-3.34945552820365E-01):c := -7.38505444863696E-01+I*(3.27511188950598E-01):d := 3.89167019539877E-01+I*(-6.23479960783872E-02):e := 1.87602633096238E-01+I*(7.86871497398994E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70721084757298E-01+I*(3.07226799288009E-01):b := 3.35323561523388E-01+I*(-7.64237267734525E-02):c := -4.38677085143740E-01+I*(3.14568566045684E-01):d := 3.69256089933363E-01+I*(1.26301174168332E-02):e := 7.33619356857158E-02+I*(5.90879716807937E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.80029435257375E-02+I*(4.55201472836577E-01):b := -1.54340639971668E-02+I*(-3.32680448072372E-02):c := -2.00675878650667E-01+I*(4.97379896350616E-01):d := 3.05808430598562E-01+I*(5.72681857669831E-02):e := 9.87793680646233E-02+I*(4.61099977861256E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.70706670944487E-01+I*(4.06112559304142E-01):b := -3.11869931564251E-01+I*(-2.25671530135692E-01):c := -1.35865234991359E-01+I*(7.90405726694093E-01):d := 2.28511906480414E-01+I*(5.06795606941577E-02):e := 1.53741129111728E-01+I*(3.86771503740999E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.60317321392802E-01+I*(1.82929306895035E-01):b := -4.15278404225533E-01+I*(-5.63606453647080E-01):c := -2.74570774624078E-01+I*(1.05653601443905E+00):d := 1.73534420268977E-01+I*(-4.05286690565668E-03):e := 2.19699711542087E-01+I*(3.42045721613058E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.62108077186791E-01+I*(-1.09918360182965E-01):b := -2.77273508365640E-01+I*(-8.88949308902097E-01):c := -5.51890634014314E-01+I*(1.17124544024093E+00):d := 1.66600548769282E-01+I*(-8.13191858753304E-02):e := 3.00511107101944E-01+I*(3.19288481414969E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.75241023788413E-01+I*(-3.35403763864774E-01):b := 3.75707314890101E-02+I*(-1.04946855814384E+00):c := -8.38063768886448E-01+I*(1.08086018891378E+00):d := 2.10954727517434E-01+I*(-1.44965626849470E-01):e := 4.08437797962720E-01+I*(3.30576788581160E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.28466677212663E-02+I*(-3.88019777776552E-01):b := 3.81935196406465E-01+I*(-9.70055460679369E-01):c := -9.99186588973684E-01+I*(8.27672524073732E-01):d := 2.85843143335384E-01+I*(-1.65211312744876E-01):e := 5.44667325197396E-01+I*(4.36896023608600E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.84805294807333E-01+I*(1.83151417114594E-02):b := 7.10771522105341E-01+I*(-7.02352863539734E-01):c := -7.77384526404573E-01+I*(4.33379541833950E-01):d := 1.68363806540195E-01+I*(-3.75174392350810E-01):e := 7.20531943723113E-02+I*(7.22949070857864E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.86647855879179E-01+I*(2.92889458925703E-01):b := 6.92363149817775E-01+I*(-3.49430128969532E-01):c := -5.56022035191747E-01+I*(2.30738962817630E-01):d := 2.01306151910191E-01+I*(-3.04939326303845E-01):e := -7.81884079325098E-02+I*(5.86976682572138E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.88170814817815E-01+I*(5.68688725246589E-01):b := 4.51407157561602E-01+I*(-9.09083029226186E-02):c := -2.56193675471792E-01+I*(2.17796339912716E-01):d := 1.81395222303677E-01+I*(-2.29961212808625E-01):e := -6.49200013929386E-02+I*(4.58504090529167E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54526735862538E-02+I*(7.16663398795157E-01):b := 1.00649532041048E-01+I*(-4.77526209564031E-02):c := -1.81924689787184E-02+I*(4.00607670217647E-01):d := 1.17947562968876E-01+I*(-1.85323144458475E-01):e := -1.01002502399138E-02+I*(3.92666520186179E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.53256940883971E-01+I*(6.67574485262722E-01):b := -1.95786335526037E-01+I*(-2.40156106284858E-01):c := 4.66181746805893E-02+I*(6.93633500561124E-01):d := 4.06510388507282E-02+I*(-1.91911769531300E-01):e := 5.06797492622366E-02+I*(3.62718905877972E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.42867591332286E-01+I*(4.44391232853615E-01):b := -2.99194808187319E-01+I*(-5.78091029796246E-01):c := -9.20873649521299E-02+I*(9.59763788306081E-01):d := -1.43264473607088E-02+I*(-2.46644197131115E-01):e := 1.14978096760181E-01+I*(3.56434217358072E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.44658347126275E-01+I*(1.51543565775616E-01):b := -1.61189912327426E-01+I*(-9.03433885051263E-01):c := -3.69407224342366E-01+I*(1.07447321410796E+00):d := -2.12603188604038E-02+I*(-3.23910516100788E-01):e := 1.86247966136629E-01+I*(3.76977629953915E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.57791293727897E-01+I*(-7.39418379061930E-02):b := 1.53654327527225E-01+I*(-1.06395313429301E+00):c := -6.55580359214499E-01+I*(9.84087962780806E-01):d := 2.30938598877478E-02+I*(-3.87556957074928E-01):e := 2.60311710970935E-01+I*(4.48000472125173E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.02963977817824E-02+I*(-1.26557851817972E-01):b := 4.98018792444679E-01+I*(-9.84540036828535E-01):c := -8.16703179301735E-01+I*(7.30900297940763E-01):d := 9.79822757056982E-02+I*(-4.07802642970334E-01):e := 2.71291829859863E-01+I*(6.10714439112678E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.30108077143163E-01+I*(2.29823067454490E-01):b := 8.09007221867928E-01+I*(-6.38831595388514E-01):c := -5.75390136543917E-01+I*(4.76545790467016E-01):d := 1.80388734099264E-01+I*(-6.81764770876188E-01):e := 1.15837667839682E-02+I*(4.85543765500138E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31950638215009E-01+I*(5.04397384668734E-01):b := 7.90598849580363E-01+I*(-2.85908860818312E-01):c := -3.54027645331091E-01+I*(2.73905211450696E-01):d := 2.13331079469260E-01+I*(-6.11529704829223E-01):e := -5.46561220659140E-02+I*(4.16064760661974E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.33473597153645E-01+I*(7.80196650989619E-01):b := 5.49642857324190E-01+I*(-2.73870347713992E-02):c := -5.41992856111359E-02+I*(2.60962588545783E-01):d := 1.93420149862747E-01+I*(-5.36551591334003E-01):e := -4.79075716612392E-02+I*(3.47133111092780E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19244544077916E-01+I*(9.28171324538188E-01):b := 1.98885231803635E-01+I*(1.57686471948163E-02):c := 1.83801920881938E-01+I*(4.43773918850714E-01):d := 1.29972490527945E-01+I*(-4.91913522983853E-01):e := -1.45850431902181E-02+I*(3.08547836167456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.07954158548141E-01+I*(8.79082411005753E-01):b := -9.75506357634494E-02+I*(-1.76634838133639E-01):c := 2.48612564541245E-01+I*(7.36799749194191E-01):d := 5.26759664097974E-02+I*(-4.98502148056678E-01):e := 2.50454926149937E-02+I*(2.92587393544315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.97564808996456E-01+I*(6.55899158596646E-01):b := -2.00959108424731E-01+I*(-5.14569761645027E-01):c := 1.09907024908526E-01+I*(1.00293003693915E+00):d := -2.30151980163974E-03+I*(-5.53234575656493E-01):e := 6.67656431628104E-02+I*(2.94469245140683E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.99355564790445E-01+I*(3.63051491518647E-01):b := -6.29542125648384E-02+I*(-8.39912616900044E-01):c := -1.67412834481710E-01+I*(1.11763946274103E+00):d := -9.23539130133488E-03+I*(-6.30500894626167E-01):e := 1.08651840316200E-01+I*(3.17279384960549E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.12488511392067E-01+I*(1.37566087836838E-01):b := 2.51890027289812E-01+I*(-1.00043186614179E+00):c := -4.53585969353843E-01+I*(1.02725421141387E+00):d := 3.51187874468167E-02+I*(-6.94147335600306E-01):e := 1.39238119447742E-01+I*(3.72073089030715E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.24400819882388E-01+I*(8.49500739250594E-02):b := 5.96254492207266E-01+I*(-9.21018768677316E-01):c := -6.14708789441079E-01+I*(7.74066546573830E-01):d := 1.10007203264767E-01+I*(-7.14393021495712E-01):e := 1.15605201121143E-01+I*(4.57065889361252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.24351540832563E-01+I*(2.92410083878050E-01):b := 8.43429449667783E-01+I*(-5.27026790265124E-01):c := -4.48400186427937E-01+I*(6.39452546391292E-01):d := 3.86672859600016E-01+I*(-9.08897152216951E-01):e := 5.93278459154551E-02+I*(3.68936321648679E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25089797607165E-02+I*(5.66984401092293E-01):b := 8.25021077380217E-01+I*(-1.74104055694922E-01):c := -2.27037695215111E-01+I*(4.36811967374972E-01):d := 4.19615204970012E-01+I*(-8.38662086169985E-01):e := 7.52921764621189E-03+I*(3.39219134110606E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.20986020822081E-01+I*(8.42783667413180E-01):b := 5.84065085124044E-01+I*(8.44177703519910E-02):c := 7.27906645048441E-02+I*(4.23869344470058E-01):d := 3.99704275363499E-01+I*(-7.63683972674765E-01):e := -1.23471022140848E-03+I*(2.93190412873813E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.73704162053642E-01+I*(9.90758340961748E-01):b := 2.33307459603489E-01+I*(1.27573452318207E-01):c := 3.10791870997918E-01+I*(6.06680674774990E-01):d := 3.36256616028697E-01+I*(-7.19045904324615E-01):e := 1.52436446830674E-02+I*(2.61057425878697E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.62413776523866E-01+I*(9.41669427429314E-01):b := -6.31284079635951E-02+I*(-6.48300330102484E-02):c := 3.75602514657226E-01+I*(8.99706505118467E-01):d := 2.58960091910550E-01+I*(-7.25634529397441E-01):e := 4.09770033629174E-02+I*(2.44598965135465E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.52024426972181E-01+I*(7.18486175020206E-01):b := -1.66536880624877E-01+I*(-4.02764956521637E-01):c := 2.36896975024506E-01+I*(1.16583679286342E+00):d := 2.03982605699113E-01+I*(-7.80366956997255E-01):e := 7.02565364205786E-02+I*(2.41799354122952E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.53815182766170E-01+I*(4.25638507942207E-01):b := -2.85319847649840E-02+I*(-7.28107811776653E-01):c := -4.04228843657294E-02+I*(1.28054621866530E+00):d := 1.97048734199417E-01+I*(-8.57633275966928E-01):e := 1.00188114937212E-01+I*(2.54221401672011E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.66948129367792E-01+I*(2.00153104260398E-01):b := 2.86312255089666E-01+I*(-8.88627061018401E-01):c := -3.26596019237863E-01+I*(1.19016096733815E+00):d := 2.41402912947569E-01+I*(-9.21279716941069E-01):e := 1.22926699327034E-01+I*(2.87410603509999E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78860437858113E-01+I*(1.47537090348619E-01):b := 6.30676720007121E-01+I*(-8.09213963553926E-01):c := -4.87718839325099E-01+I*(9.36973302498106E-01):d := 3.16291328765520E-01+I*(-9.41525402836475E-01):e := 1.15257931350917E-01+I*(3.39660621394247E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.59509075865357E-01+I*(1.76791030420348E-01):b := 7.97931662556904E-01+I*(-4.19253159058796E-01):c := -4.55834685051988E-01+I*(8.45873928002886E-01):d := 6.90693548127965E-01+I*(-9.50293770848515E-01):e := 1.17065366299968E-01+I*(3.06419205548966E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.57666514793511E-01+I*(4.51365347634591E-01):b := 7.79523290269337E-01+I*(-6.63304244885946E-02):c := -2.34472193839162E-01+I*(6.43233348986566E-01):d := 7.23635893497961E-01+I*(-8.80058704801550E-01):e := 6.96020058779354E-02+I*(3.01156082611922E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.56143555854875E-01+I*(7.27164613955477E-01):b := 5.38567298013165E-01+I*(1.92191401558318E-01):c := 6.53561658807932E-02+I*(6.30290726081652E-01):d := 7.03724963891448E-01+I*(-8.05080591306329E-01):e := 4.80594893714706E-02+I*(2.67899381694832E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.08861697086436E-01+I*(8.75139287504046E-01):b := 1.87809672492610E-01+I*(2.35347083524534E-01):c := 3.03357372373867E-01+I*(8.13102056386584E-01):d := 6.40277304556647E-01+I*(-7.60442522956180E-01):e := 5.22072425557707E-02+I*(2.37059053457255E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.97571311556661E-01+I*(8.26050373971611E-01):b := -1.08626195074474E-01+I*(4.29435981960787E-02):c := 3.68168016033175E-01+I*(1.10612788673006E+00):d := 5.62980780438499E-01+I*(-7.67031148029005E-01):e := 6.90219097371039E-02+I*(2.17160078331386E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08718196200498E+00+I*(6.02867121562504E-01):b := -2.12034667735756E-01+I*(-2.94991325315309E-01):c := 2.29462476400456E-01+I*(1.37225817447502E+00):d := 5.08003294227061E-01+I*(-8.21763575628820E-01):e := 9.18084046163909E-02+I*(2.08338315914999E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08897271779896E+00+I*(3.10019454484504E-01):b := -7.40297718758634E-02+I*(-6.20334180570326E-01):c := -4.78573829897804E-02+I*(1.48696760027690E+00):d := 5.01069422727367E-01+I*(-8.99029894598493E-01):e := 1.17556424881763E-01+I*(2.11693548679503E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.02105664400587E-01+I*(8.45340508026955E-02):b := 2.40814467978787E-01+I*(-7.80853429812074E-01):c := -3.34030517861914E-01+I*(1.39658234894974E+00):d := 5.45423601475518E-01+I*(-9.62676335572633E-01):e := 1.41320476359665E-01+I*(2.31495334709770E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.14017972890907E-01+I*(3.19180368909171E-02):b := 5.85178932896241E-01+I*(-7.01440332347598E-01):c := -4.95153337949150E-01+I*(1.14339468410970E+00):d := 6.20312017293469E-01+I*(-9.82922021468039E-01):e := 1.48067283617693E-01+I*(2.70281852201713E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.65331703828489E-01+I*(-6.29346528431094E-02):b := 6.93802780776050E-01+I*(-3.65939181581465E-01):c := -5.94214947884627E-01+I*(9.99223076727619E-01):d := 9.50196140707295E-01+I*(-7.86584688841004E-01):e := 1.79297296131348E-01+I*(2.67585237485344E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.63489142756643E-01+I*(2.11639664371134E-01):b := 6.75394408488485E-01+I*(-1.30164470112625E-02):c := -3.72852456671802E-01+I*(7.96582497711299E-01):d := 9.83138486077291E-01+I*(-7.16349622794039E-01):e := 1.34347076797731E-01+I*(2.83033432875397E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.61966183818007E-01+I*(4.87438930692020E-01):b := 4.34438416232312E-01+I*(2.45505379035650E-01):c := -7.30240969518459E-02+I*(7.83639874806385E-01):d := 9.63227556470778E-01+I*(-6.41371509298819E-01):e := 1.00163709094987E-01+I*(2.60149685008078E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.14684325049568E-01+I*(6.35413604240589E-01):b := 8.36807907117569E-02+I*(2.88661061001866E-01):c := 1.64977109541228E-01+I*(9.66451205111317E-01):d := 8.99779897135976E-01+I*(-5.96733440948669E-01):e := 9.29149960042352E-02+I*(2.28574645099271E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00339393951979E+00+I*(5.86324690708154E-01):b := -2.12755076855328E-01+I*(9.62575756734108E-02):c := 2.29787753200535E-01+I*(1.25947703545479E+00):d := 8.22483373017829E-01+I*(-6.03322066021494E-01):e := 1.02599894721453E-01+I*(2.03881201286689E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19300458996811E+00+I*(3.63141438299046E-01):b := -3.16163549516609E-01+I*(-2.41677347837977E-01):c := 9.10822135678159E-02+I*(1.52560732319975E+00):d := 7.67505886806392E-01+I*(-6.58054493621309E-01):e := 1.21282909729223E-01+I*(1.88643231224613E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19479534576210E+00+I*(7.02937712210464E-02):b := -1.78158653656717E-01+I*(-5.67020203092995E-01):c := -1.86237645822420E-01+I*(1.64031674900163E+00):d := 7.60572015306697E-01+I*(-7.35320812590982E-01):e := 1.45624402277193E-01+I*(1.83977566322915E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00792829236372E+00+I*(-1.55191632460762E-01):b := 1.36685586197934E-01+I*(-7.27539452334742E-01):c := -4.72410780694554E-01+I*(1.54993149767448E+00):d := 8.04926194054848E-01+I*(-7.98967253565123E-01):e := 1.72539731779137E-01+I*(1.93892333987202E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.19840600854040E-01+I*(-2.07807646372540E-01):b := 4.81050051115388E-01+I*(-6.48126354870266E-01):c := -6.33533600781790E-01+I*(1.29674383283443E+00):d := 8.79814609872799E-01+I*(-8.19212939460528E-01):e := 1.91602666693376E-01+I*(2.24529088022041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.92303841010504E-01+I*(-3.14596654459150E-01):b := 5.79765865374099E-01+I*(-3.92031060413631E-01):c := -7.98791312021150E-01+I*(1.02774622159124E+00):d := 1.04375649022007E+00+I*(-4.94371205089515E-01):e := 2.54640989706787E-01+I*(2.44179725789322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.90461279938658E-01+I*(-4.00223372449071E-02):b := 5.61357493086533E-01+I*(-3.91083258434291E-02):c := -5.77428820808324E-01+I*(8.25105642574919E-01):d := 1.07669883559007E+00+I*(-4.24136139042550E-01):e := 2.11344697347827E-01+I*(2.84002094670634E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.88938321000022E-01+I*(2.35776929075979E-01):b := 3.20401500830360E-01+I*(2.19413500203484E-01):c := -2.77600461088370E-01+I*(8.12163019670005E-01):d := 1.05678790598356E+00+I*(-3.49158025547330E-01):e := 1.60085909915082E-01+I*(2.72054269199270E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.41656462231582E-01+I*(3.83751602624548E-01):b := -3.03561246901946E-02+I*(2.62569182169699E-01):c := -3.95992545952955E-02+I*(9.94974349974937E-01):d := 9.93340246648755E-01+I*(-3.04519957197180E-01):e := 1.39245927715071E-01+I*(2.36912344369930E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.30366076701807E-01+I*(3.34662689092113E-01):b := -3.26791992257279E-01+I*(7.01656968412444E-02):c := 2.52113890640124E-02+I*(1.28800018031841E+00):d := 9.16043722530607E-01+I*(-3.11108582270005E-01):e := 1.42085658987868E-01+I*(2.04777446376598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.11997672715012E+00+I*(1.11479436683005E-01):b := -4.30200464918561E-01+I*(-2.67769226670144E-01):c := -1.13494150568707E-01+I*(1.55413046806337E+00):d := 8.61066236319170E-01+I*(-3.65841009869819E-01):e := 1.58063366186172E-01+I*(1.81477339312839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12176748294411E+00+I*(-1.81368230394994E-01):b := -2.92195569058668E-01+I*(-5.93112081925161E-01):c := -3.90814009958944E-01+I*(1.66883989386525E+00):d := 8.54132364819475E-01+I*(-4.43107328839493E-01):e := 1.82881252639542E-01+I*(1.68167137663110E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.34900429545733E-01+I*(-4.06853634076803E-01):b := 2.26486707959824E-02+I*(-7.53631331166908E-01):c := -6.76987144831077E-01+I*(1.57845464253810E+00):d := 8.98486543567627E-01+I*(-5.06753769813633E-01):e := 2.14842886904750E-01+I*(1.68721312515702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.46812738036054E-01+I*(-4.59469647988581E-01):b := 3.67013135713437E-01+I*(-6.74218233702433E-01):c := -8.38109964918312E-01+I*(1.32526697769805E+00):d := 9.73374959385577E-01+I*(-5.26999455709039E-01):e := 2.47350529555155E-01+I*(1.92600284303876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.74596036038225E-01+I*(-4.60439526960029E-01):b := 5.09180056446764E-01+I*(-4.85320115470793E-01):c := -9.73840223069048E-01+I*(9.18097066112613E-01):d := 9.27596669321810E-01+I*(-2.10383256232492E-01):e := 3.61718609392937E-01+I*(2.45559573082219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.27534749663791E-02+I*(-1.85865209745786E-01):b := 4.90771684159198E-01+I*(-1.32397380900590E-01):c := -7.52477731856223E-01+I*(7.15456487096293E-01):d := 9.60539014691806E-01+I*(-1.40148190185527E-01):e := 3.14453065815705E-01+I*(3.25958657471237E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.71230516027743E-01+I*(8.99340565751001E-02):b := 2.49815691903025E-01+I*(1.26124445146323E-01):c := -4.52649372136267E-01+I*(7.02513864191379E-01):d := 9.40628085085293E-01+I*(-6.51700766903066E-02):e := 2.29661257364640E-01+I*(3.24493077208458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23948657259304E-01+I*(2.37908730123669E-01):b := -1.00941933617530E-01+I*(1.69280127112538E-01):c := -2.14648165643194E-01+I*(8.85325194496311E-01):d := 8.77180425750492E-01+I*(-2.05320083401566E-02):e := 1.89731680820830E-01+I*(2.76113166525712E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.12658271729529E-01+I*(1.88819816591234E-01):b := -3.97377801184614E-01+I*(-2.31233582159168E-02):c := -1.49837521983886E-01+I*(1.17835102483979E+00):d := 7.99883901632344E-01+I*(-2.71206334129818E-02):e := 1.86951419183644E-01+I*(2.29489192559594E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.02268922177844E-01+I*(-3.43634358178738E-02):b := -5.00786273845896E-01+I*(-3.61058281727305E-01):c := -2.88543061616605E-01+I*(1.44448131258474E+00):d := 7.44906415420907E-01+I*(-8.18530610127963E-02):e := 2.03334372032506E-01+I*(1.93907714044949E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.04059677971833E-01+I*(-3.27211102895873E-01):b := -3.62781377986003E-01+I*(-6.86401136982322E-01):c := -5.65862921006841E-01+I*(1.55919073838663E+00):d := 7.37972543921212E-01+I*(-1.59119379982470E-01):e := 2.32485928842781E-01+I*(1.69423468690604E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.17192624573455E-01+I*(-5.52696506577682E-01):b := -4.79371381313528E-02+I*(-8.46920386224070E-01):c := -8.52036055878975E-01+I*(1.46880548705947E+00):d := 7.82326722669364E-01+I*(-2.22765820956610E-01):e := 2.74279052375829E-01+I*(1.59385010721980E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.29104933063776E-01+I*(-6.05312520489460E-01):b := 2.96427326786101E-01+I*(-7.67507288759594E-01):c := -1.01315887596621E+00+I*(1.21561782221943E+00):d := 8.57215138487314E-01+I*(-2.43011506852016E-01):e := 3.26846996881185E-01+I*(1.77383375237631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.59238095890765E-02+I*(-4.32221769439602E-01):b := 5.15073238465030E-01+I*(-6.02155361099344E-01):c := -1.03745435009706E+00+I*(7.21581668754814E-01):d := 6.56069149183412E-01+I*(-6.75019597146251E-02):e := 5.26950008814776E-01+I*(3.40108306931734E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87766370660923E-01+I*(-1.57647452225359E-01):b := 4.96664866177464E-01+I*(-2.49232626529141E-01):c := -8.16091858884239E-01+I*(5.18941089738494E-01):d := 6.89011494553408E-01+I*(2.73310633234040E-03):e := 4.21175060621529E-01+I*(5.02304520862843E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.92893295995589E-02+I*(1.18151814095527E-01):b := 2.55708873921291E-01+I*(9.28919951777138E-03):c := -5.16263499164284E-01+I*(5.05998466833580E-01):d := 6.69100564946894E-01+I*(7.77112198275608E-02):e := 2.58887986249250E-01+I*(4.69576423404722E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.63428811632002E-01+I*(2.66126487644096E-01):b := -9.50487515992641E-02+I*(5.24448814839867E-02):c := -2.78262292671210E-01+I*(6.88809797138511E-01):d := 6.05652905612093E-01+I*(1.22349288177711E-01):e := 2.08517034367352E-01+I*(3.73902905381391E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.52138426102227E-01+I*(2.17037574111661E-01):b := -3.91484619166348E-01+I*(-1.39958603844468E-01):c := -2.13451649011903E-01+I*(9.81835627481988E-01):d := 5.28356381493945E-01+I*(1.15760663104885E-01):e := 2.15511255297051E-01+I*(2.99783966138283E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.41749076550542E-01+I*(-6.14567829744620E-03):b := -4.94893091827630E-01+I*(-4.77893527355856E-01):c := -3.52157188644622E-01+I*(1.24796591522695E+00):d := 4.73378895282508E-01+I*(6.10282355050707E-02):e := 2.45553786242362E-01+I*(2.47169297018715E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.43539832344531E-01+I*(-2.98993345375445E-01):b := -3.56888195967737E-01+I*(-8.03236382610873E-01):c := -6.29477048034857E-01+I*(1.36267534102883E+00):d := 4.66445023782813E-01+I*(-1.62380834646032E-02):e := 2.91544464930801E-01+I*(2.10236470870086E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56672778946153E-01+I*(-5.24478749057255E-01):b := -4.20439561130868E-02+I*(-9.63755631852621E-01):c := -9.15650182906991E-01+I*(1.27229008970167E+00):d := 5.10799202530965E-01+I*(-7.98845244387431E-02):e := 3.57641475676870E-01+I*(1.91557904692921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.68585087436474E-01+I*(-5.77094762969033E-01):b := 3.02320508804367E-01+I*(-8.84342534388145E-01):c := -1.07677300299423E+00+I*(1.01910242486163E+00):d := 5.85687618348915E-01+I*(-1.00130210334149E-01):e := 4.50130095355001E-01+I*(2.14441964045839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.64677851137464E-01+I*(-2.99988406661640E-01):b := 4.36312320455530E-01+I*(-4.80367137859620E-01):c := -1.11137612816664E+00+I*(9.07668945197319E-02):d := 3.97331376999034E-01+I*(9.43501372428344E-02):e := 8.43384279039882E-01+I*(9.36540625612945E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.66520412209310E-01+I*(-2.54140894473971E-02):b := 4.17903948167964E-01+I*(-1.27444403289418E-01):c := -8.90013636953817E-01+I*(-1.11873684496588E-01):d := 4.30273722369030E-01+I*(1.64585203289800E-01):e := 9.57653705649295E-01+I*(5.12448983893931E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.68043371147946E-01+I*(2.50385176873489E-01):b := 1.76947955911792E-01+I*(1.31077422757495E-01):c := -5.90185277233862E-01+I*(-1.24816307401502E-01):d := 4.10362792762516E-01+I*(2.39563316785020E-01):e := 5.44937255041904E-01+I*(6.68940862007264E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.53252299163853E-02+I*(3.98359850422057E-01):b := -1.73809669608763E-01+I*(1.74233104723710E-01):c := -3.52184070740789E-01+I*(5.79950229034297E-02):d := 3.46915133427715E-01+I*(2.84201385135170E-01):e := 3.66637961292415E-01+I*(4.93792565542050E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.73384384553839E-01+I*(3.49270936889623E-01):b := -4.70245537175848E-01+I*(-1.81703806047442E-02):c := -2.87373427081481E-01+I*(3.51020853246906E-01):d := 2.69618609309567E-01+I*(2.77612760062345E-01):e := 3.41164909831823E-01+I*(3.53730081256680E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.62995035002154E-01+I*(1.26087684480515E-01):b := -5.73654009837130E-01+I*(-3.56105304116132E-01):c := -4.26078966714200E-01+I*(6.17151140991863E-01):d := 2.14641123098130E-01+I*(2.22880332462530E-01):e := 3.61270536523850E-01+I*(2.53562938986989E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.64785790796144E-01+I*(-1.66759982597484E-01):b := -4.35649113977237E-01+I*(-6.81448159371150E-01):c := -7.03398826104436E-01+I*(7.31860566793745E-01):d := 2.07707251598435E-01+I*(1.45614013492857E-01):e := 4.04893082641828E-01+I*(1.73084970778466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.77918737397766E-01+I*(-3.92245386279293E-01):b := -1.20804874122587E-01+I*(-8.41967408612898E-01):c := -9.89571960976569E-01+I*(6.41475315466589E-01):d := 2.52061430346586E-01+I*(8.19675725187165E-02):e := 4.77036848271272E-01+I*(1.02144388984544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01689541119137E-02+I*(-4.44861400191072E-01):b := 2.23559590794868E-01+I*(-7.62554311148422E-01):c := -1.15069478106381E+00+I*(3.88287650626546E-01):d := 3.26949846164537E-01+I*(6.17218866233106E-02):e := 6.05242863403957E-01+I*(4.71763151428532E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.82127581197980E-01+I*(-3.85264807030601E-02):b := 5.52395916493745E-01+I*(-4.94851714008786E-01):c := -9.28892718494695E-01+I*(-6.00533161323691E-03):d := 2.09470509369348E-01+I*(-1.48241192982623E-01):e := 8.27497707656530E-01+I*(7.52351717052959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.83970142269827E-01+I*(2.36047836511183E-01):b := 5.33987544206179E-01+I*(-1.41928979438584E-01):c := -7.07530227281869E-01+I*(-2.08645910629557E-01):d := 2.42412854739344E-01+I*(-7.80061269356579E-02):e := 3.31326943340486E-01+I*(9.93462215487144E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.85493101208463E-01+I*(5.11847102832069E-01):b := 2.93031551950006E-01+I*(1.16592846608329E-01):c := -4.07701867561914E-01+I*(-2.21588533534471E-01):d := 2.22501925132831E-01+I*(-3.02801344043742E-03):e := 1.15415801474065E-01+I*(7.11183177002207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.27749599769017E-02+I*(6.59821776380637E-01):b := -5.77260735705489E-02+I*(1.59748528574544E-01):c := -1.69700661068841E-01+I*(-3.87772032295392E-02):d := 1.59054265798029E-01+I*(4.16100549097128E-02):e := 1.36441499613984E-01+I*(5.27488344778595E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.55934654493323E-01+I*(6.10732862848203E-01):b := -3.54161941137633E-01+I*(-3.26549567539103E-02):c := -1.04890017409533E-01+I*(2.54248627113937E-01):d := 8.17577416798811E-02+I*(3.50214298368873E-02):e := 1.97853149924775E-01+I*(4.24243587863479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.45545304941638E-01+I*(3.87549610439096E-01):b := -4.57570413798915E-01+I*(-3.70589880265299E-01):c := -2.43595557042252E-01+I*(5.20378914858894E-01):d := 2.67802554684440E-02+I*(-1.97109977629271E-02):e := 2.71560604434289E-01+I*(3.58035041763218E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.47336060735627E-01+I*(9.47019433610963E-02):b := -3.19565517939022E-01+I*(-6.95932735520315E-01):c := -5.20915416432487E-01+I*(6.35088340660776E-01):d := 1.98463839687487E-02+I*(-9.69773167326011E-02):e := 3.62669043871744E-01+I*(3.13407937685662E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.60469007337249E-01+I*(-1.30783460320712E-01):b := -4.72127808437214E-03+I*(-8.56451984762063E-01):c := -8.07088551304621E-01+I*(5.44703089333620E-01):d := 6.42005627169004E-02+I*(-1.60623757706741E-01):e := 4.90829611343114E-01+I*(2.95746062776744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.76186841724301E-02+I*(-1.83399474232491E-01):b := 3.39643186833082E-01+I*(-7.77038887297588E-01):c := -9.68211371391857E-01+I*(2.91515424493577E-01):d := 1.39088978534851E-01+I*(-1.80869443602147E-01):e := 6.89725648129422E-01+I*(3.65056094127064E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.27430363533811E-01+I*(1.72981445039971E-01):b := 6.50631616256332E-01+I*(-4.31330445857567E-01):c := -7.26898328634038E-01+I*(3.71609170198301E-02):d := 2.21495436928417E-01+I*(-4.54831571508001E-01):e := 2.87890376064493E-01+I*(6.46921988506070E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.29272924605657E-01+I*(4.47555762254214E-01):b := 6.32223243968766E-01+I*(-7.84077112873644E-02):c := -5.05535837421213E-01+I*(-1.65479661996490E-01):d := 2.54437782298413E-01+I*(-3.84596505461036E-01):e := 8.29356751233704E-02+I*(6.15955660135117E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.30795883544292E-01+I*(7.23355028575100E-01):b := 3.91267251712594E-01+I*(1.80114114759548E-01):c := -2.05707477701258E-01+I*(-1.78422284901404E-01):d := 2.34526852691900E-01+I*(-3.09618391965815E-01):e := 3.17000912096791E-02+I*(4.83646451070517E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.21922257687268E-01+I*(8.71329702123668E-01):b := 4.05096261920386E-02+I*(2.23269796725764E-01):c := 3.22937287918155E-02+I*(4.38904540352803E-03):d := 1.71079193357098E-01+I*(-2.64980323615665E-01):e := 5.98618067968105E-02+I*(3.96536103611717E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.10631872157493E-01+I*(8.22240788591234E-01):b := -2.55926241375046E-01+I*(3.08663113973090E-02):c := 9.71043724511233E-02+I*(2.97414875747004E-01):d := 9.37826692389503E-02+I*(-2.71568948688491E-01):e := 1.07948194601815E-01+I*(3.47441648206321E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.00242522605808E-01+I*(5.99057536182126E-01):b := -3.59334714036328E-01+I*(-3.07068612114079E-01):c := -4.16011671815960E-02+I*(5.63545163491961E-01):d := 3.88051830275131E-02+I*(-3.26301376288305E-01):e := 1.64550250751716E-01+I*(3.22162445810271E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.02033278399797E-01+I*(3.06209869104127E-01):b := -2.21329818176435E-01+I*(-6.32411467369096E-01):c := -3.18921026571832E-01+I*(6.78254589293843E-01):d := 3.18713115278177E-02+I*(-4.03567695257979E-01):e := 2.31623610925596E-01+I*(3.18882493710120E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.15166225001419E-01+I*(8.07244654223181E-02):b := 9.35144216782154E-02+I*(-7.92930716610844E-01):c := -6.05094161443965E-01+I*(5.87869337966687E-01):d := 7.62254902759694E-02+I*(-4.67214136232119E-01):e := 3.12274088552397E-01+I*(3.52675266398588E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.27078533491740E-01+I*(2.81084515105397E-02):b := 4.37878886595670E-01+I*(-7.13517619146369E-01):c := -7.66216981531201E-01+I*(3.34681673126644E-01):d := 1.51113906093920E-01+I*(-4.87459822127525E-01):e := 3.79807117288811E-01+I*(4.68118936359925E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.27029254441915E-01+I*(2.35568461463531E-01):b := 6.85053844056187E-01+I*(-3.19525640734177E-01):c := -5.99908378518059E-01+I*(2.00067672944106E-01):d := 4.27779562429169E-01+I*(-6.81963952848764E-01):e := 2.15190502409530E-01+I*(4.24521928728329E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.51866933700685E-02+I*(5.10142778677774E-01):b := 6.66645471768620E-01+I*(3.33970938360259E-02):c := -3.78545887305233E-01+I*(-2.57290607221413E-03):d := 4.60721907799166E-01+I*(-6.11728886801798E-01):e := 1.15916289732940E-01+I*(4.27636093381428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.23663734431432E-01+I*(7.85942044998660E-01):b := 4.25689479512448E-01+I*(2.91918919882938E-01):c := -7.87175275852782E-02+I*(-1.55155289771281E-02):d := 4.40810978192652E-01+I*(-5.36750773306578E-01):e := 7.05013789891495E-02+I*(3.64793104183356E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76381875662994E-01+I*(9.33916718547228E-01):b := 7.49318539918928E-02+I*(3.35074601849154E-01):c := 1.59283678907796E-01+I*(1.67295801327803E-01):d := 3.77363318857851E-01+I*(-4.92112704956427E-01):e := 7.58721544894226E-02+I*(3.09318157729051E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.65091490133218E-01+I*(8.84827805014793E-01):b := -2.21504013575191E-01+I*(1.42671116520699E-01):c := 2.24094322567103E-01+I*(4.60321631671279E-01):d := 3.00066794739703E-01+I*(-4.98701330029253E-01):e := 1.01695216237053E-01+I*(2.73904947749555E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.54702140581533E-01+I*(6.61644552605686E-01):b := -3.24912486236474E-01+I*(-1.95263806990689E-01):c := 8.53887829343841E-02+I*(7.26451919416237E-01):d := 2.45089308528265E-01+I*(-5.53433757629067E-01):e := 1.36749559030451E-01+I*(2.55013530104866E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.56492896375523E-01+I*(3.68796885527687E-01):b := -1.86907590376581E-01+I*(-5.20606662245706E-01):c := -1.91931076455851E-01+I*(8.41161345218119E-01):d := 2.38155437028570E-01+I*(-6.30700076598741E-01):e := 1.78868184205170E-01+I*(2.52619935157403E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.69625842977144E-01+I*(1.43311481845878E-01):b := 1.27936649478070E-01+I*(-6.81125911487454E-01):c := -4.78104211327985E-01+I*(7.50776093890962E-01):d := 2.82509615776722E-01+I*(-6.94346517572881E-01):e := 2.25647393097560E-01+I*(2.75013550111390E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.81538151467465E-01+I*(9.06954679340998E-02):b := 4.72301114395524E-01+I*(-6.01712814022978E-01):c := -6.39227031415220E-01+I*(4.97588429050919E-01):d := 3.57398031594673E-01+I*(-7.14592203468288E-01):e := 2.57256487018298E-01+I*(3.38915634451332E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.62186789474709E-01+I*(1.19949408005828E-01):b := 6.39556056945307E-01+I*(-2.11752009527849E-01):c := -6.07342877142109E-01+I*(4.06489054555700E-01):d := 7.31800250957118E-01+I*(-7.23360571480328E-01):e := 2.32858765187383E-01+I*(3.00222773781931E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.60344228402863E-01+I*(3.94523725220072E-01):b := 6.21147684657741E-01+I*(1.41170725042353E-01):c := -3.85980385929284E-01+I*(2.03848475539380E-01):d := 7.64742596327114E-01+I*(-6.53125505433363E-01):e := 1.72785773963686E-01+I*(3.28599060248856E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.58821269464227E-01+I*(6.70322991540957E-01):b := 3.80191692401568E-01+I*(3.99692551089266E-01):c := -8.61520262093290E-02+I*(1.90905852634466E-01):d := 7.44831666720601E-01+I*(-5.78147391938142E-01):e := 1.23686291055041E-01+I*(3.00119007475639E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.11539410695788E-01+I*(8.18297665089527E-01):b := 2.94340668810138E-02+I*(4.42848233055481E-01):c := 1.51849180283745E-01+I*(3.73717182939398E-01):d := 6.81384007385800E-01+I*(-5.33509323587992E-01):e := 1.12108542270638E-01+I*(2.58609291676841E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.00249025166013E-01+I*(7.69208751557092E-01):b := -2.67001800686071E-01+I*(2.50444747727027E-01):c := 2.16659823943053E-01+I*(6.66743013282874E-01):d := 6.04087483267652E-01+I*(-5.40097948660818E-01):e := 1.22840205319374E-01+I*(2.26169672398491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08985967561433E+00+I*(5.46025499147984E-01):b := -3.70410273347353E-01+I*(-8.74901757843618E-02):c := 7.79542843103330E-02+I*(9.32873301027831E-01):d := 5.49109997056215E-01+I*(-5.94830376260632E-01):e := 1.44935126475584E-01+I*(2.05209297288625E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09165043140832E+00+I*(2.53177832069985E-01):b := -2.32405377487460E-01+I*(-4.12833031039379E-01):c := -1.99365575079902E-01+I*(1.04758272682971E+00):d := 5.42176125556520E-01+I*(-6.72096695230306E-01):e := 1.74727093660062E-01+I*(1.96296448925969E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.04783378009939E-01+I*(2.76924283881759E-02):b := 8.24388623671904E-02+I*(-5.73352280281127E-01):c := -4.85538709952036E-01+I*(9.57197475502557E-01):d := 5.86530304304671E-01+I*(-7.35743136204446E-01):e := 2.10104128946089E-01+I*(2.04319287809129E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.16695686500260E-01+I*(-2.49235855236026E-02):b := 4.26803327284645E-01+I*(-4.93939182816651E-01):c := -6.46661530039271E-01+I*(7.04009810662514E-01):d := 6.61418720122622E-01+I*(-7.55988822099852E-01):e := 2.40653069066355E-01+I*(2.39913798582882E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.68009417437842E-01+I*(-1.19776275257629E-01):b := 5.35427175164454E-01+I*(-1.58438032050517E-01):c := -7.45723139974749E-01+I*(5.59838203280433E-01):d := 9.91302843536448E-01+I*(-5.59651489472817E-01):e := 2.69624657155815E-01+I*(2.16708537484795E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.66166856365995E-01+I*(1.54798041956614E-01):b := 5.17018802876888E-01+I*(1.94484702519685E-01):c := -5.24360648761923E-01+I*(3.57197624264113E-01):d := 1.02424518890644E+00+I*(-4.89416423425852E-01):e := 2.34926692729511E-01+I*(2.62414962664566E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.64643897427359E-01+I*(4.30597308277500E-01):b := 2.76062810620716E-01+I*(4.53006528566598E-01):c := -2.24532289041969E-01+I*(3.44255001359199E-01):d := 1.00433425929993E+00+I*(-4.14438309930632E-01):e := 1.82408909482469E-01+I*(2.59388883439879E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.17362038658920E-01+I*(5.78571981826069E-01):b := -7.46948148998394E-02+I*(4.96162210532813E-01):c := 1.34689174511053E-02+I*(5.27066331664131E-01):d := 9.40886599965130E-01+I*(-3.69800241580482E-01):e := 1.56270710503081E-01+I*(2.27510881461169E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00607165312915E+00+I*(5.29483068293634E-01):b := -3.71130682466924E-01+I*(3.03758725204359E-01):c := 7.82795611104127E-02+I*(8.20092162007607E-01):d := 8.63590075846982E-01+I*(-3.76388866653307E-01):e := 1.54773602195664E-01+I*(1.95164096528958E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19568230357746E+00+I*(3.06299815884527E-01):b := -4.74539155128206E-01+I*(-3.41761983070295E-02):c := -6.04259785223062E-02+I*(1.08622244975256E+00):d := 8.08612589635545E-01+I*(-4.31121294253122E-01):e := 1.67620922785414E-01+I*(1.70251809509093E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19747305937145E+00+I*(1.34521488065275E-02):b := -3.36534259268313E-01+I*(-3.59519053562046E-01):c := -3.37745837912542E-01+I*(1.20093187555445E+00):d := 8.01678718135850E-01+I*(-5.08387613222795E-01):e := 1.90131018805220E-01+I*(1.54353115372449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01060600597307E+00+I*(-2.12033254875282E-01):b := -2.16900194136627E-02+I*(-5.20038302803794E-01):c := -6.23918972784675E-01+I*(1.11054662422729E+00):d := 8.46032896884002E-01+I*(-5.72034054196935E-01):e := 2.20794995353645E-01+I*(1.50957506927933E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.22518314463392E-01+I*(-2.64649268787060E-01):b := 3.22674445503792E-01+I*(-4.40625205339319E-01):c := -7.85041792871911E-01+I*(8.57358959387247E-01):d := 9.20921312701952E-01+I*(-5.92279740092341E-01):e := 2.54746942065929E-01+I*(1.69159146374363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.94981554619856E-01+I*(-3.71438276873670E-01):b := 4.21390259762502E-01+I*(-1.84529910882684E-01):c := -9.50299504111272E-01+I*(5.88361348144052E-01):d := 1.08486319304923E+00+I*(-2.67438005721328E-01):e := 3.19980009165913E-01+I*(1.48568582811323E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.93138993548010E-01+I*(-9.68639596594271E-02):b := 4.02981887474936E-01+I*(1.68392823687519E-01):c := -7.28937012898447E-01+I*(3.85720769127732E-01):d := 1.11780553841922E+00+I*(-1.97202939674362E-01):e := 3.09959918955439E-01+I*(2.09964528098816E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91616034609374E-01+I*(1.78935306661459E-01):b := 1.62025895218764E-01+I*(4.26914649734431E-01):c := -4.29108653178492E-01+I*(3.72778146222818E-01):d := 1.09789460881271E+00+I*(-1.22224826179142E-01):e := 2.53940433348678E-01+I*(2.33751497592541E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.44334175840935E-01+I*(3.26909980210028E-01):b := -1.88731730301791E-01+I*(4.70070331700647E-01):c := -1.91107446685418E-01+I*(5.55589476527750E-01):d := 1.03444694947791E+00+I*(-7.75867578289922E-02):e := 2.11051059606185E-01+I*(2.11061037223533E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.33043790311160E-01+I*(2.77821066677593E-01):b := -4.85167597868876E-01+I*(2.77666846372193E-01):c := -1.26296803026111E-01+I*(8.48615306871227E-01):d := 9.57150425359761E-01+I*(-8.41753829018174E-02):e := 1.96649443636862E-01+I*(1.76788980449589E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12265444075947E+00+I*(5.46378142684849E-02):b := -5.88576070530158E-01+I*(-6.02680771391959E-02):c := -2.65002342658830E-01+I*(1.11474559461618E+00):d := 9.02172939148324E-01+I*(-1.38907810501632E-01):e := 2.01074094737607E-01+I*(1.46147111790516E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12444519655346E+00+I*(-2.38209852809514E-01):b := -4.50571174670265E-01+I*(-3.85610932394213E-01):c := -5.42322202049065E-01+I*(1.22945502041807E+00):d := 8.95239067648628E-01+I*(-2.16174129471305E-01):e := 2.18095279575917E-01+I*(1.22326923916020E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.37578143155085E-01+I*(-4.63695256491323E-01):b := -1.35726934815614E-01+I*(-5.46130181635961E-01):c := -8.28495336921199E-01+I*(1.13906976909091E+00):d := 9.39593246396780E-01+I*(-2.79820570445445E-01):e := 2.46382062825915E-01+I*(1.08048802941939E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.49490451645406E-01+I*(-5.16311270403101E-01):b := 2.08637530101840E-01+I*(-4.66717084171485E-01):c := -9.89618157008434E-01+I*(8.85882104250866E-01):d := 1.01448166221473E+00+I*(-3.00066256340851E-01):e := 2.85000733141853E-01+I*(1.11646157759721E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.77273749647577E-01+I*(-5.17281149374549E-01):b := 3.50804450835167E-01+I*(-2.77818965939845E-01):c := -1.12534841515917E+00+I*(4.78712192665426E-01):d := 9.68703372150963E-01+I*(1.65499431356953E-02):e := 3.95585462509963E-01+I*(8.45325181655530E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.54311885757311E-02+I*(-2.42706832160305E-01):b := 3.32396078547601E-01+I*(7.51037686303572E-02):c := -9.03985923946344E-01+I*(2.76071613649107E-01):d := 1.00164571752096E+00+I*(8.67850091826604E-02):e := 4.19202709534827E-01+I*(1.67214818566784E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.73908229637095E-01+I*(3.30924341605807E-02):b := 9.14400862914289E-02+I*(3.33625594677270E-01):c := -6.04157564226390E-01+I*(2.63128990744193E-01):d := 9.81734787914446E-01+I*(1.61763122677881E-01):e := 3.55479693199823E-01+I*(2.30926575921754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26626370868656E-01+I*(1.81067107709149E-01):b := -2.59317539229126E-01+I*(3.76781276643486E-01):c := -3.66156357733316E-01+I*(4.45940321049124E-01):d := 9.18287128579645E-01+I*(2.06401191028031E-01):e := 2.85087879357208E-01+I*(2.17718525392839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.15335985338881E-01+I*(1.31978194176715E-01):b := -5.55753406796210E-01+I*(1.84377791315031E-01):c := -3.01345714074008E-01+I*(7.38966151392601E-01):d := 8.40990604461497E-01+I*(1.99812565955205E-01):e := 2.53315726202759E-01+I*(1.76364305623959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.04946635787196E-01+I*(-9.12050582323928E-02):b := -6.59161879457493E-01+I*(-1.53557132196357E-01):c := -4.40051253706727E-01+I*(1.00509643913756E+00):d := 7.86013118250060E-01+I*(1.45080138355391E-01):e := 2.48769658242968E-01+I*(1.35437228200075E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.06737391581185E-01+I*(-3.84052725310392E-01):b := -5.21156983597600E-01+I*(-4.78899987451374E-01):c := -7.17371113096963E-01+I*(1.11980586493944E+00):d := 7.79079246750365E-01+I*(6.78138193857174E-02):e := 2.61425488218871E-01+I*(1.00291272958025E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.19870338182807E-01+I*(-6.09538128992201E-01):b := -2.06312743742950E-01+I*(-6.39419236693122E-01):c := -1.00354424796910E+00+I*(1.02942061361228E+00):d := 8.23433425498516E-01+I*(4.16737841157731E-03):e := 2.89408434998512E-01+I*(7.26244555908455E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.31782646673128E-01+I*(-6.62154142903980E-01):b := 1.38051721174505E-01+I*(-5.60006139228647E-01):c := -1.16466706805633E+00+I*(7.76232948772241E-01):d := 8.98321841316467E-01+I*(-1.60783074838290E-02):e := 3.35552442892337E-01+I*(5.97733059567990E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.32460959797251E-02+I*(-4.89063391854122E-01):b := 3.56697632853433E-01+I*(-3.94654211568396E-01):c := -1.18896254218719E+00+I*(2.82196795307626E-01):d := 6.97175852012564E-01+I*(1.59431239653563E-01):e := 5.34838798287558E-01+I*(2.76867541536122E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.85088657051571E-01+I*(-2.14489074639879E-01):b := 3.38289260565867E-01+I*(-4.17314769981941E-02):c := -9.67600050974361E-01+I*(7.95562162913070E-02):d := 7.30118197382560E-01+I*(2.29666305700528E-01):e := 6.20349998061202E-01+I*(1.65202870004609E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.66116159902071E-02+I*(6.13101916810072E-02):b := 9.73332683096945E-02+I*(2.16790349048719E-01):c := -6.67771691254406E-01+I*(6.66135933863928E-02):d := 7.10207267776047E-01+I*(3.04644419195748E-01):e := 5.12705716382187E-01+I*(3.11135270127979E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.66106525241354E-01+I*(2.09284865229576E-01):b := -2.53424357210861E-01+I*(2.59946031014934E-01):c := -4.29770484761332E-01+I*(2.49424923691325E-01):d := 6.46759608441246E-01+I*(3.49282487545898E-01):e := 3.79405077506692E-01+I*(2.90223957312455E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54816139711579E-01+I*(1.60195951697141E-01):b := -5.49860224777945E-01+I*(6.75425456864798E-02):c := -3.64959841102025E-01+I*(5.42450754034801E-01):d := 5.69463084323098E-01+I*(3.42693862473073E-01):e := 3.24835836541084E-01+I*(2.20728115502244E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.44426790159894E-01+I*(-6.29873007119663E-02):b := -6.53268697439227E-01+I*(-2.70392377824909E-01):c := -5.03665380734744E-01+I*(8.08581041779758E-01):d := 5.14485598111661E-01+I*(2.87961434873259E-01):e := 3.14562004136081E-01+I*(1.56550730573523E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.46217545953883E-01+I*(-3.55834967789966E-01):b := -5.15263801579335E-01+I*(-5.95735233079926E-01):c := -7.80985240124979E-01+I*(9.23290467581640E-01):d := 5.07551726611966E-01+I*(2.10695115903585E-01):e := 3.28190998775877E-01+I*(1.01363921978052E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.59350492555504E-01+I*(-5.81320371471775E-01):b := -2.00419561724684E-01+I*(-7.56254482321674E-01):c := -1.06715837499711E+00+I*(8.32905216254483E-01):d := 5.51905905360117E-01+I*(1.47048674929445E-01):e := 3.62861936730669E-01+I*(5.32151740031496E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.71262801045825E-01+I*(-6.33936385383553E-01):b := 1.43944903192771E-01+I*(-6.76841384857198E-01):c := -1.22828119508435E+00+I*(5.79717551414440E-01):d := 6.26794321178068E-01+I*(1.26802989034039E-01):e := 4.27434101639318E-01+I*(1.72887558079688E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.99163694109290E-01+I*(-3.45252816780531E-01):b := 1.81610399936957E-01+I*(-4.23213912284374E-01):c := -9.45006984268744E-01+I*(-3.43209034816559E-01):d := 2.82951089495853E-01+I*(2.94613932831692E-01):e := 6.00108502142810E-01+I*(-4.42325692375755E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.01006255181136E-01+I*(-7.06784995662876E-02):b := 1.63202027649391E-01+I*(-7.02911777141717E-02):c := -7.23644493055918E-01+I*(-5.45849613832879E-01):d := 3.15893434865849E-01+I*(3.64848998878657E-01):e := 9.47227286067591E-01+I*(-6.46417715524963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.02529214119772E-01+I*(2.05120766754598E-01):b := -7.77539646067814E-02+I*(1.88230648332741E-01):c := -4.23816133335963E-01+I*(-5.58792236737793E-01):d := 2.95982505259336E-01+I*(4.39827112373877E-01):e := 1.55841737499266E+00+I*(-6.65202685803624E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.98110728882112E-02+I*(3.53095440303167E-01):b := -4.28511590127336E-01+I*(2.31386330298957E-01):c := -1.85814926842890E-01+I*(-3.75980906432861E-01):d := 2.32534845924535E-01+I*(4.84465180724027E-01):e := 9.59801355450900E-01+I*(4.14986353358005E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.38898541582013E-01+I*(3.04006526770732E-01):b := -7.24947457694421E-01+I*(3.89828449705021E-02):c := -1.21004283183582E-01+I*(-8.29550760893851E-02):d := 1.55238321806387E-01+I*(4.77876555651202E-01):e := 6.49040556453902E-01+I*(2.64652921604559E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.28509192030329E-01+I*(8.08232743616248E-02):b := -8.28355930355703E-01+I*(-2.98952078540886E-01):c := -2.59709822816301E-01+I*(1.83175211655572E-01):d := 1.00260835594950E-01+I*(4.23144128051388E-01):e := 5.42588377257477E-01+I*(1.15617615509010E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.30299947824318E-01+I*(-2.12024392716375E-01):b := -6.90351034495810E-01+I*(-6.24294933795903E-01):c := -5.37029682206537E-01+I*(2.97884637457454E-01):d := 9.33269640952546E-02+I*(3.45877809081714E-01):e := 5.00690723384110E-01+I*(-8.34003686872179E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.43432894425940E-01+I*(-4.37509796398183E-01):b := -3.75506794641160E-01+I*(-7.84814183037651E-01):c := -8.23202817078670E-01+I*(2.07499386130297E-01):d := 1.37681142843406E-01+I*(2.82231368107574E-01):e := 4.89746996153368E-01+I*(-1.27179177159187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46547970837399E-02+I*(-4.90125810309962E-01):b := -3.11423297237051E-02+I*(-7.05401085573176E-01):c := -9.84325637165906E-01+I*(-4.56882787097457E-02):d := 2.12569558661357E-01+I*(2.61985682212168E-01):e := 5.09863952657756E-01+I*(-2.62343494570677E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.16613424169806E-01+I*(-8.37908908219507E-02):b := 2.97693995975171E-01+I*(-4.37698488433540E-01):c := -7.62523574596796E-01+I*(-4.39981260949528E-01):d := 9.50902218661675E-02+I*(5.20226026062342E-02):e := 1.32502634059363E+00+I*(-7.54044360222963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.18455985241653E-01+I*(1.90783426392293E-01):b := 2.79285623687606E-01+I*(-8.47757538633377E-02):c := -5.41161083383970E-01+I*(-6.42621839965848E-01):d := 1.28032567236164E-01+I*(1.22257668653199E-01):e := 4.70551696880237E+00+I*(-4.49018959511265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.19978944180289E-01+I*(4.66582692713179E-01):b := 3.83296314314329E-02+I*(1.73746072183575E-01):c := -2.41332723664015E-01+I*(-6.55564462870762E-01):d := 1.08121637629650E-01+I*(1.97235782148420E-01):e := 6.10402526996480E-01+I*(2.07191163131117E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.72608029487276E-02+I*(6.14557366261747E-01):b := -3.12427994089122E-01+I*(2.16901754149791E-01):c := -3.33151717094140E-03+I*(-4.72753132565830E-01):d := 4.46739782948488E-02+I*(2.41873850498570E-01):e := 4.28212346655870E-01+I*(9.89896461008757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21448811521497E-01+I*(5.65468452729313E-01):b := -6.08863861656206E-01+I*(2.44982688213361E-02):c := 6.14791264883665E-02+I*(-1.79727302222354E-01):d := -3.26225458232990E-02+I*(2.35285225425744E-01):e := 4.83344671794929E-01+I*(6.01717895543849E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.11059461969812E-01+I*(3.42285200320205E-01):b := -7.12272334317489E-01+I*(-3.13436654690052E-01):c := -7.72264131443531E-02+I*(8.64029855226033E-02):d := -8.76000320347361E-02+I*(1.80552797825930E-01):e := 5.47689054858918E-01+I*(3.70183451644462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.12850217763802E-01+I*(4.94375332422056E-02):b := -5.74267438457596E-01+I*(-6.38779509945069E-01):c := -3.54546272534589E-01+I*(2.01112411324485E-01):d := -9.45339035344314E-02+I*(1.03286478856256E-01):e := 6.18760918422676E-01+I*(1.82331733301794E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25983164365423E-01+I*(-1.76047870439603E-01):b := -2.59423198602945E-01+I*(-7.99298759186817E-01):c := -6.40719407406722E-01+I*(1.10727159997328E-01):d := -5.01797247862796E-02+I*(3.96400378821162E-02):e := 7.12424583024475E-01+I*(-1.28458419869459E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.21045271442561E-02+I*(-2.28663884351382E-01):b := 8.49412663145091E-02+I*(-7.19885661722342E-01):c := -8.01842227493958E-01+I*(-1.42460504842714E-01):d := 2.47086910316707E-02+I*(1.93943519867103E-02):e := 8.74540314126270E-01+I*(-2.74251714937614E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61916206505636E-01+I*(1.27717034921080E-01):b := 3.95929695737759E-01+I*(-3.74177220282320E-01):c := -5.60529184736140E-01+I*(-3.96815012316461E-01):d := 1.07115149425237E-01+I*(-2.54567775919144E-01):e := 1.31980303253236E+00+I*(9.96202208074511E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.63758767577483E-01+I*(4.02291352135323E-01):b := 3.77521323450193E-01+I*(-2.12544857121182E-02):c := -3.39166693523314E-01+I*(-5.99455591332781E-01):d := 1.40057494795233E-01+I*(-1.84332709872179E-01):e := 2.66506807249318E-01+I*(1.44642322608475E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.65281726516118E-01+I*(6.78090618456209E-01):b := 1.36565331194020E-01+I*(2.37267340334795E-01):c := -3.93383338033589E-02+I*(-6.12398214237695E-01):d := 1.20146565188719E-01+I*(-1.09354596376958E-01):e := 3.37981490220773E-02+I*(8.81427801631638E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.74364147154426E-02+I*(8.26065292004778E-01):b := -2.14192294326535E-01+I*(2.80423022301010E-01):c := 1.98662872689715E-01+I*(-4.29586883932763E-01):d := 5.66989058539180E-02+I*(-6.47165280268082E-02):e := 1.14599465728089E-01+I*(6.28573927072500E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76146029185667E-01+I*(7.76976378472343E-01):b := -5.10628161893619E-01+I*(8.80195369725555E-02):c := 2.63473516349022E-01+I*(-1.36561053589287E-01):d := -2.05976182642298E-02+I*(-7.13051530996335E-02):e := 2.12295657486602E-01+I*(4.98148655018942E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.65756679633982E-01+I*(5.53793126063236E-01):b := -6.14036634554901E-01+I*(-2.49915386538833E-01):c := 1.24767976716303E-01+I*(1.29569234155670E-01):d := -7.55751044756668E-02+I*(-1.26037580699448E-01):e := 3.13566593337025E-01+I*(4.13066974991179E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67547435427971E-01+I*(2.60945458985236E-01):b := -4.76031738695008E-01+I*(-5.75258241793850E-01):c := -1.52551882673933E-01+I*(2.44278659957552E-01):d := -8.25089759753622E-02+I*(-2.03303899669122E-01):e := 4.33463300534732E-01+I*(3.49014412684826E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.80680382029593E-01+I*(3.54600553034278E-02):b := -1.61187498840358E-01+I*(-7.35777491035598E-01):c := -4.38725017546066E-01+I*(1.53893408630396E-01):d := -3.81547972272106E-02+I*(-2.66950340643262E-01):e := 6.05938714564966E-01+I*(3.05526501326077E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.25926905199138E-02+I*(-1.71559586083510E-02):b := 1.83176966077097E-01+I*(-6.56364393571122E-01):c := -5.99847837633302E-01+I*(-9.92942562096473E-02):d := 3.67336185907398E-02+I*(-2.87196026538668E-01):e := 9.16337445605118E-01+I*(3.48094422924074E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.25434114700892E-02+I*(1.90304051344640E-01):b := 4.30351923537613E-01+I*(-2.62372415158930E-01):c := -4.33539234620160E-01+I*(-2.33908256392186E-01):d := 3.13399274925989E-01+I*(-4.81700157259906E-01):e := 5.24761094178989E-01+I*(5.79576298430491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.29914960175712E-03+I*(4.64878368558883E-01):b := 4.11943551250047E-01+I*(9.05503194112721E-02):c := -2.12176743407334E-01+I*(-4.36548835408505E-01):d := 3.46341620295985E-01+I*(-4.11465091212941E-01):e := 2.74521464585492E-01+I*(6.89062391655063E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.91778914596070E-02+I*(7.40677634879769E-01):b := 1.70987558993875E-01+I*(3.49072145458185E-01):c := 8.76516163126209E-02+I*(-4.49491458313420E-01):d := 3.26430690689472E-01+I*(-3.36486977717720E-01):e := 1.34249866646649E-01+I*(5.49744633112154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.41896032691168E-01+I*(8.88652308428338E-01):b := -1.79770066526680E-01+I*(3.92227827424400E-01):c := 3.25652822805695E-01+I*(-2.66680128008488E-01):d := 2.62983031354670E-01+I*(-2.91848909367570E-01):e := 1.32884586132498E-01+I*(4.29834830727811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.30605647161392E-01+I*(8.39563394895904E-01):b := -4.76205934093765E-01+I*(1.99824342095946E-01):c := 3.90463466465002E-01+I*(2.63457023349884E-02):d := 1.85686507236522E-01+I*(-2.98437534440396E-01):e := 1.71302342395670E-01+I*(3.55549257594382E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.20216297609708E-01+I*(6.16380142486796E-01):b := -5.79614406755047E-01+I*(-1.38110581415443E-01):c := 2.51757926832283E-01+I*(2.92475990079946E-01):d := 1.30709021025085E-01+I*(-3.53169962040210E-01):e := 2.24416529951063E-01+I*(3.08551558204376E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.22007053403697E-01+I*(3.23532475408796E-01):b := -4.41609510895154E-01+I*(-4.63453436670460E-01):c := -2.55619325579526E-02+I*(4.07185415881827E-01):d := 1.23775149525390E-01+I*(-4.30436281009884E-01):e := 2.92071257402086E-01+I*(2.81434439668426E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.35140000005318E-01+I*(9.80470717269878E-02):b := -1.26765271040503E-01+I*(-6.23972685912207E-01):c := -3.11735067430086E-01+I*(3.16800164554671E-01):d := 1.68129328273542E-01+I*(-4.94082721984024E-01):e := 3.82963730782478E-01+I*(2.82370375401029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.47052308495639E-01+I*(4.54310578152091E-02):b := 2.17599193876951E-01+I*(-5.44559588447732E-01):c := -4.72857887517322E-01+I*(6.36124997146280E-02):d := 2.43017744091492E-01+I*(-5.14328407879430E-01):e := 4.99324203851174E-01+I*(3.55332567693597E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27700946502884E-01+I*(7.46849978869380E-02):b := 3.84854136426734E-01+I*(-1.54598783952603E-01):c := -4.40973733244210E-01+I*(-2.74868747805914E-02):d := 6.17419963453938E-01+I*(-5.23096775891471E-01):e := 4.17275946438687E-01+I*(3.16417845608813E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25858385431037E-01+I*(3.49259315101181E-01):b := 3.66445764139168E-01+I*(1.98323950617599E-01):c := -2.19611242031385E-01+I*(-2.30127453796911E-01):d := 6.50362308823934E-01+I*(-4.52861709844505E-01):e := 3.34262149999847E-01+I*(4.19412498170747E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.24335426492401E-01+I*(6.25058581422067E-01):b := 1.25489771882995E-01+I*(4.56845776664512E-01):c := 8.02171176885701E-02+I*(-2.43070076701825E-01):d := 6.30451379217421E-01+I*(-3.77883596349285E-01):e := 2.22392137849343E-01+I*(3.94989988069280E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.77053567723962E-01+I*(7.73033254970636E-01):b := -2.25267853637560E-01+I*(5.00001458630728E-01):c := 3.18218324181644E-01+I*(-6.02587463968935E-02):d := 5.67003719882619E-01+I*(-3.33245527999135E-01):e := 1.84135958404776E-01+I*(3.25011273288697E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.65763182194187E-01+I*(7.23944341438201E-01):b := -5.21703721204644E-01+I*(3.07597973302273E-01):c := 3.83028967840952E-01+I*(2.32767083946583E-01):d := 4.89707195764471E-01+I*(-3.39834153071960E-01):e := 1.89565553523851E-01+I*(2.67572979198811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05537383264250E+00+I*(5.00761089029094E-01):b := -6.25112193865926E-01+I*(-3.03369502091156E-02):c := 2.44323428208232E-01+I*(4.98897371691540E-01):d := 4.34729709553034E-01+I*(-3.94566580671775E-01):e := 2.14719397730510E-01+I*(2.26458106782899E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05716458843649E+00+I*(2.07913421951094E-01):b := -4.87107298006033E-01+I*(-3.55679805464133E-01):c := -3.29964311820034E-02+I*(6.13606797493422E-01):d := 4.27795838053339E-01+I*(-4.71832899641449E-01):e := 2.53511507786628E-01+I*(1.99232716244186E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.70297535038113E-01+I*(-1.75719817307144E-02):b := -1.72263058151383E-01+I*(-5.16199054705880E-01):c := -3.19169566054137E-01+I*(5.23221546166265E-01):d := 4.72150016801491E-01+I*(-5.35479340615589E-01):e := 3.07579396483070E-01+I*(1.89786133625971E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.82209843528434E-01+I*(-7.01879956424930E-02):b := 1.72101406766072E-01+I*(-4.36785957241405E-01):c := -4.80292386141372E-01+I*(2.70033881326222E-01):d := 5.47038432619441E-01+I*(-5.55725026510995E-01):e := 3.76179913523493E-01+I*(2.17439507001642E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.33523574466016E-01+I*(-1.65040685376519E-01):b := 2.80725254645881E-01+I*(-1.01284806475271E-01):c := -5.79353996076850E-01+I*(1.25862273944141E-01):d := 8.76922556033268E-01+I*(-3.59387693883960E-01):e := 3.96172238129806E-01+I*(1.62209161837313E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.31681013394170E-01+I*(1.09533631837724E-01):b := 2.62316882358315E-01+I*(2.51637928094931E-01):c := -3.57991504864024E-01+I*(-7.67783050721786E-02):d := 9.09864901403264E-01+I*(-2.89152627836995E-01):e := 3.86509701199322E-01+I*(2.55082684341803E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.30158054455533E-01+I*(3.85332898158610E-01):b := 2.13608901021424E-02+I*(5.10159754141844E-01):c := -5.81631451440694E-02+I*(-8.97209279770928E-02):d := 8.89953971796751E-01+I*(-2.14174514341774E-01):e := 3.02113071577708E-01+I*(2.90032737657101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.82876195687094E-01+I*(5.33307571707178E-01):b := -3.29396735418413E-01+I*(5.53315436108059E-01):c := 1.79838061349004E-01+I*(9.30904023278390E-02):d := 8.26506312461949E-01+I*(-1.69536445991624E-01):e := 2.42355343851509E-01+I*(2.54809769064751E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.71585810157319E-01+I*(4.84218658174744E-01):b := -6.25832602985497E-01+I*(3.60911950779605E-01):c := 2.44648705008312E-01+I*(3.86116232671315E-01):d := 7.49209788343801E-01+I*(-1.76125071064450E-01):e := 2.24551865274631E-01+I*(2.07412108107589E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16119646060563E+00+I*(2.61035405765637E-01):b := -7.29241075646779E-01+I*(2.29770272682165E-02):c := 1.05943165375593E-01+I*(6.52246520416273E-01):d := 6.94232302132364E-01+I*(-2.30857498664264E-01):e := 2.30855415589466E-01+I*(1.66885969562565E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16298721639962E+00+I*(-3.18122613123626E-02):b := -5.91236179786886E-01+I*(-3.02365827986801E-01):c := -1.71376694014643E-01+I*(7.66955946218154E-01):d := 6.87298430632669E-01+I*(-3.08123817633938E-01):e := 2.52490654547865E-01+I*(1.35133037682796E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.76120163001245E-01+I*(-2.57297664994172E-01):b := -2.76391939932236E-01+I*(-4.62885077228548E-01):c := -4.57549828886776E-01+I*(6.76570694890997E-01):d := 7.31652609380820E-01+I*(-3.71770258608078E-01):e := 2.88755167212992E-01+I*(1.14179295773645E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.88032471491566E-01+I*(-3.09913678905950E-01):b := 6.79725249852185E-02+I*(-3.83471979764073E-01):c := -6.18672648974011E-01+I*(4.23383030050955E-01):d := 8.06541025198771E-01+I*(-3.92015944503484E-01):e := 3.41420855994347E-01+I*(1.14516562713320E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.60495711648030E-01+I*(-4.16702686992561E-01):b := 1.66688339243929E-01+I*(-1.27376685307437E-01):c := -7.83930360213374E-01+I*(1.54385418807761E-01):d := 9.70482905546046E-01+I*(-6.71742101324705E-02):e := 3.98665366924941E-01+I*(4.30562378291533E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.58653150576184E-01+I*(-1.42128369778317E-01):b := 1.48279966956363E-01+I*(2.25546049262765E-01):c := -5.62567869000548E-01+I*(-4.82551602085589E-02):d := 1.00342525091604E+00+I*(3.06085591449480E-03):e := 4.39684307027541E-01+I*(1.18655987116656E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.57130191637548E-01+I*(1.33670896542569E-01):b := -9.26760252998093E-02+I*(4.84067875309678E-01):c := -2.62739509280593E-01+I*(-6.11977831134731E-02):d := 9.83514321309529E-01+I*(7.80389694097151E-02):e := 3.89622669567063E-01+I*(1.97905612958940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.09848332869109E-01+I*(2.81645570091137E-01):b := -4.43433650820364E-01+I*(5.27223557275893E-01):c := -2.47383027875190E-02+I*(1.21613547191459E-01):d := 9.20066661974728E-01+I*(1.22677037759865E-01):e := 3.13285685445871E-01+I*(1.98519598352308E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.98557947339333E-01+I*(2.32556656558703E-01):b := -7.39869518387449E-01+I*(3.34820071947439E-01):c := 4.00723408717889E-02+I*(4.14639377534935E-01):d := 8.42770137856580E-01+I*(1.16088412687040E-01):e := 2.72894129218637E-01+I*(1.60713790150743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08816859778765E+00+I*(9.37340414959482E-03):b := -8.43277991048731E-01+I*(-3.11485156394947E-03):c := -9.86331987609305E-02+I*(6.80769665279892E-01):d := 7.87792651645143E-01+I*(6.13559850872254E-02):e := 2.61939012992412E-01+I*(1.19206717896510E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08995935358164E+00+I*(-2.83474262928405E-01):b := -7.05273095188838E-01+I*(-3.28457706818967E-01):c := -3.75953058151166E-01+I*(7.95479091081775E-01):d := 7.80858780145448E-01+I*(-1.59103338824485E-02):e := 2.69616162088925E-01+I*(8.17954672800588E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.03092300183260E-01+I*(-5.08959666610213E-01):b := -3.90428855334188E-01+I*(-4.88976956060714E-01):c := -6.62126193023300E-01+I*(7.05093839754618E-01):d := 8.25212958893600E-01+I*(-7.95567748565882E-02):e := 2.93290682142362E-01+I*(5.01928261473140E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.15004608673580E-01+I*(-5.61575680521992E-01):b := -4.60643904167333E-02+I*(-4.09563858596239E-01):c := -8.23249013110536E-01+I*(4.51906174914575E-01):d := 9.00101374711550E-01+I*(-9.98024607519940E-02):e := 3.36204937036966E-01+I*(3.02797707080577E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.42787906675752E-01+I*(-5.62545559493439E-01):b := 9.61025303165941E-02+I*(-2.20665740364599E-01):c := -9.58979271261271E-01+I*(4.47362633291353E-02):d := 8.54323084647783E-01+I*(2.16813738724552E-01):e := 4.17007383420722E-01+I*(-7.33845015267644E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.09453456039055E-02+I*(-2.87971242279196E-01):b := 7.76941580290280E-02+I*(1.32256994205604E-01):c := -7.37616780048445E-01+I*(-1.57904315687185E-01):d := 8.87265430017779E-01+I*(2.87048804771518E-01):e := 5.07065808465305E-01+I*(-2.70749501755578E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.39422386665270E-01+I*(-1.21719759583098E-02):b := -1.63261834227144E-01+I*(3.90778820252517E-01):c := -4.37788420328490E-01+I*(-1.70846938592099E-01):d := 8.67354500411266E-01+I*(3.62026918266738E-01):e := 5.11471621502076E-01+I*(9.73718445739787E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.92140527896831E-01+I*(1.35802697590259E-01):b := -5.14019459747700E-01+I*(4.33934502218732E-01):c := -1.99787213835416E-01+I*(1.19643917128333E-02):d := 8.03906841076464E-01+I*(4.06664986616888E-01):e := 4.16609822476947E-01+I*(1.50255285446793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.80850142367055E-01+I*(8.67137840578242E-02):b := -8.10455327314784E-01+I*(2.41531016890277E-01):c := -1.34976570176109E-01+I*(3.04990222056309E-01):d := 7.26610316958317E-01+I*(4.00076361544063E-01):e := 3.44736773950270E-01+I*(1.24236595665368E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.70460792815371E-01+I*(-1.36469468351283E-01):b := -9.13863799976066E-01+I*(-9.64039066211109E-02):c := -2.73682109808828E-01+I*(5.71120509801267E-01):d := 6.71632830746880E-01+I*(3.45343933944248E-01):e := 3.12277973709668E-01+I*(7.90959468385876E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.72251548609360E-01+I*(-4.29317135429282E-01):b := -7.75858904116173E-01+I*(-4.21746761876128E-01):c := -5.51001969199063E-01+I*(6.85829935603148E-01):d := 6.64698959247184E-01+I*(2.68077614974574E-01):e := 3.04745866019138E-01+I*(3.31979731441489E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.85384495210982E-01+I*(-6.54802539111092E-01):b := -4.61014664261523E-01+I*(-5.82266011117876E-01):c := -8.37175104071197E-01+I*(5.95444684275992E-01):d := 7.09053137995336E-01+I*(2.04431174000434E-01):e := 3.16158456060322E-01+I*(-1.10294144317406E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.97296803701302E-01+I*(-7.07418553022870E-01):b := -1.16650199344068E-01+I*(-5.02852913653401E-01):c := -9.98297924158433E-01+I*(3.42257019435949E-01):d := 7.83941553813286E-01+I*(1.84185488105028E-01):e := 3.49955296997733E-01+I*(-5.14715121005209E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.17731938951551E-01+I*(-5.34327801973012E-01):b := 1.01995712334860E-01+I*(-3.37500985993150E-01):c := -1.02259339828929E+00+I*(-1.51779134028664E-01):d := 5.82795564509384E-01+I*(3.59695035242420E-01):e := 4.62714894332895E-01+I*(-2.16426681119406E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.19574500023397E-01+I*(-2.59753484758769E-01):b := 8.35873400472937E-02+I*(1.54217485770523E-02):c := -8.01230907076462E-01+I*(-3.54419713044984E-01):d := 6.15737909879380E-01+I*(4.29930101289385E-01):e := 6.21598927322439E-01+I*(-2.30864263130111E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.21097458962033E-01+I*(1.60457815621169E-02):b := -1.57368652208879E-01+I*(2.73943574623965E-01):c := -5.01402547356507E-01+I*(-3.67362335949898E-01):d := 5.95826980272867E-01+I*(5.04908214784605E-01):e := 7.48079490429639E-01+I*(-3.41364366641551E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.31620682269528E-01+I*(1.64020455110685E-01):b := -5.08126277729434E-01+I*(3.17099256590181E-01):c := -2.63401340863433E-01+I*(-1.84551005644966E-01):d := 5.32379320938066E-01+I*(5.49546283134755E-01):e := 6.07000475213767E-01+I*(1.33662747993423E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.20330296739753E-01+I*(1.14931541578251E-01):b := -8.04562145296518E-01+I*(1.24695771261726E-01):c := -1.98590697204125E-01+I*(1.08474824698510E-01):d := 4.55082796819918E-01+I*(5.42957658061930E-01):e := 4.67023820674270E-01+I*(1.17107050334346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.09940947188068E-01+I*(-1.08251710830856E-01):b := -9.07970617957800E-01+I*(-2.13239152249662E-01):c := -3.37296236836844E-01+I*(3.74605112443467E-01):d := 4.00105310608481E-01+I*(4.88225230462115E-01):e := 3.99346656473235E-01+I*(5.56206368353432E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.11731702982057E-01+I*(-4.01099377908856E-01):b := -7.69965722097907E-01+I*(-5.38582007504680E-01):c := -6.14616096227080E-01+I*(4.89314538245349E-01):d := 3.93171439108785E-01+I*(4.10958911492442E-01):e := 3.71496666527140E-01+I*(-9.22354096360866E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.24864649583679E-01+I*(-6.26584781590665E-01):b := -4.55121482243257E-01+I*(-6.99101256746427E-01):c := -9.00789231099213E-01+I*(3.98929286918192E-01):d := 4.37525617856937E-01+I*(3.47312470518302E-01):e := 3.68428474658835E-01+I*(-7.49587035888301E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.36776958074000E-01+I*(-6.79200795502443E-01):b := -1.10757017325803E-01+I*(-6.19688159281952E-01):c := -1.06191205118645E+00+I*(1.45741622078150E-01):d := 5.12414033674887E-01+I*(3.27066784622896E-01):e := 3.91809798404390E-01+I*(-1.45159667483631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54676784468324E-01+I*(-3.57760294051280E-01):b := -5.02399761814159E-02+I*(-5.43151240098836E-01):c := -5.38606475799728E-01+I*(-5.68713859600293E-01):d := 6.66036193783756E-02+I*(3.74502669001023E-01):e := 1.83100885918229E-01+I*(-6.38925788183051E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.56519345540170E-01+I*(-8.31859768370368E-02):b := -6.86483484689818E-02+I*(-1.90228505528633E-01):c := -3.17243984586902E-01+I*(-7.71354438616613E-01):d := 9.95459647483717E-02+I*(4.44737735047988E-01):e := 4.20779771822925E-02+I*(-8.73614788574195E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.58042304478806E-01+I*(1.92613289483849E-01):b := -3.09604340725154E-01+I*(6.82933205182795E-02):c := -1.74156248669467E-02+I*(-7.84297061521527E-01):d := 7.96350351418584E-02+I*(5.19715848543208E-01):e := -5.38134228668627E-02+I*(-1.47334593499260E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05324163247245E-01+I*(3.40587963032418E-01):b := -6.60361966245709E-01+I*(1.11449002484495E-01):c := 2.20585581626127E-01+I*(-6.01485731216595E-01):d := 1.61873758070571E-02+I*(5.64353916893358E-01):e := 1.79217385962920E+00+I*(-2.28496141990503E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.83385451222980E-01+I*(2.91499049499983E-01):b := -9.56797833812794E-01+I*(-8.09544828439596E-02):c := 2.85396225285435E-01+I*(-3.08459900873119E-01):d := -6.11091483110907E-02+I*(5.57765291820533E-01):e := 1.48175941807641E+00+I*(-2.52599724114439E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.72996101671295E-01+I*(6.83157970908754E-02):b := -1.06020630647408E+00+I*(-4.18889406355348E-01):c := 1.46690685652715E-01+I*(-4.23296131281617E-02):d := -1.16086634522528E-01+I*(5.03032864220719E-01):e := 8.57260580373399E-01+I*(-2.14623297995467E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.74786857465284E-01+I*(-2.24531869987124E-01):b := -9.22201410614183E-01+I*(-7.44232261610365E-01):c := -1.30629173737521E-01+I*(7.23798126737199E-02):d := -1.23020506022223E-01+I*(4.25766545251045E-01):e := 5.94335506472932E-01+I*(-3.05217123286907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.87919804066906E-01+I*(-4.50017273668933E-01):b := -6.07357170759533E-01+I*(-9.04751510852113E-01):c := -4.16802308609654E-01+I*(-1.80054386534367E-02):d := -7.86663272740715E-02+I*(3.62120104276905E-01):e := 4.34305441109999E-01+I*(-3.99361057085667E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00167887442774E-01+I*(-5.02633287580712E-01):b := -2.62992705842078E-01+I*(-8.25338413387638E-01):c := -5.77925128696890E-01+I*(-2.71193103493480E-01):d := -3.77791145612112E-03+I*(3.41874418381499E-01):e := 3.07252058312120E-01+I*(-5.02577506050991E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.72126514528840E-01+I*(-9.62983680926998E-02):b := 6.58436198567986E-02+I*(-5.57635816248002E-01):c := -3.56123066127779E-01+I*(-6.65486085733262E-01):d := -1.21257248251310E-01+I*(1.31911338775565E-01):e := -9.92038883314349E-02+I*(-1.01605603847156E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.73969075600686E-01+I*(1.78275949121543E-01):b := 4.74352475692326E-02+I*(-2.04713081677799E-01):c := -1.34760574914954E-01+I*(-8.68126664749582E-01):d := -8.83149028813140E-02+I*(2.02146404822530E-01):e := -6.92669535675791E-01+I*(-1.02160220750889E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.75492034539322E-01+I*(4.54075215442429E-01):b := -1.93520744686940E-01+I*(5.38087443691137E-02):c := 1.65067784805001E-01+I*(-8.81069287654496E-01):d := -1.08225832487827E-01+I*(2.77124518317751E-01):e := -1.62831918236192E+00+I*(-6.28811526290566E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22773893307761E-01+I*(6.02049888990998E-01):b := -5.44278370207495E-01+I*(9.69644263353288E-02):c := 4.03068991298075E-01+I*(-6.98257957349564E-01):d := -1.71673491822629E-01+I*(3.21762586667901E-01):e := -2.31258882050800E+00+I*(1.56026148527301E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.65935721162464E-01+I*(5.52960975458563E-01):b := -8.40714237774580E-01+I*(-9.54390589931259E-02):c := 4.67879634957383E-01+I*(-4.05232127006088E-01):d := -2.48970015940777E-01+I*(3.15173961595075E-01):e := 9.69750434395199E-01+I*(2.38648384512549E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.55546371610778E-01+I*(3.29777723049456E-01):b := -9.44122710435861E-01+I*(-4.33373982504514E-01):c := 3.29174095324663E-01+I*(-1.39101839261131E-01):d := -3.03947502152214E-01+I*(2.60441533995261E-01):e := 1.52958265285040E+00+I*(5.11449577717456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.57337127404768E-01+I*(3.69300559714566E-02):b := -8.06117814575969E-01+I*(-7.58716837759531E-01):c := 5.18542359344277E-02+I*(-2.43924134592491E-02):d := -3.10881373651909E-01+I*(1.83175215025587E-01):e := 1.14077743950276E+00+I*(-2.94724530372310E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.70470074006390E-01+I*(-1.88555347710352E-01):b := -4.91273574721318E-01+I*(-9.19236087001279E-01):c := -2.34318898937706E-01+I*(-1.14777664786406E-01):d := -2.66527194903757E-01+I*(1.19528774051447E-01):e := 7.37026504273600E-01+I*(-6.74953184024783E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.17617617503290E-01+I*(-2.41171361622131E-01):b := -1.46909109803863E-01+I*(-8.39822989536804E-01):c := -3.95441719024942E-01+I*(-3.67965329626449E-01):d := -1.91638779085807E-01+I*(9.92830881560408E-02):e := 3.42991005370058E-01+I*(-8.91644429204901E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.17429296864670E-01+I*(1.15209557650331E-01):b := 1.64079319619386E-01+I*(-4.94114548096782E-01):c := -1.54128676267123E-01+I*(-6.22319837100195E-01):d := -1.09232320692241E-01+I*(-1.74679039749813E-01):e := -1.58468642704788E+00+I*(-2.48355657979483E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.19271857936516E-01+I*(3.89783874864574E-01):b := 1.45670947331820E-01+I*(-1.41191813526580E-01):c := 6.72338149457025E-02+I*(-8.24960416116515E-01):d := -7.62899753222448E-02+I*(-1.04443973702848E-01):e := -1.84272621372229E+00+I*(6.17924565953077E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20794816875152E-01+I*(6.65583141185460E-01):b := -9.52850449243527E-02+I*(1.17330012520333E-01):c := 3.67062174665658E-01+I*(-8.37903039021429E-01):d := -9.62009049287581E-02+I*(-2.94658602076276E-02):e := -1.00399330157275E+00+I*(7.78833609469702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.19233243564091E-02+I*(8.13557814734028E-01):b := -4.46042670444908E-01+I*(1.60485694486548E-01):c := 6.05063381158731E-01+I*(-6.55091708716497E-01):d := -1.59648564263559E-01+I*(1.51722081425223E-02):e := -4.09694014995818E-01+I*(9.47384350963392E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.20632938826634E-01+I*(7.64468901201594E-01):b := -7.42478538011992E-01+I*(-3.19177908419062E-02):c := 6.69874024818039E-01+I*(-3.62065878373021E-01):d := -2.36945088381707E-01+I*(8.58358306969734E-03):e := 5.32784361823395E-02+I*(9.50850514283877E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.10243589274949E-01+I*(5.41285648792486E-01):b := -8.45887010673274E-01+I*(-3.69852714353295E-01):c := 5.31168485185319E-01+I*(-9.59355906280634E-02):d := -2.91922574593144E-01+I*(-4.61488445301173E-02):e := 4.83924807421508E-01+I*(8.55829620413754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.12034345068938E-01+I*(2.48437981714487E-01):b := -7.07882114813381E-01+I*(-6.95195569608312E-01):c := 2.53848625795084E-01+I*(1.87738351738181E-02):d := -2.98856446092840E-01+I*(-1.23415163499791E-01):e := 9.58332328510045E-01+I*(6.21777709645774E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.25167291670559E-01+I*(2.29525780326784E-02):b := -3.93037874958731E-01+I*(-8.55714818850059E-01):c := -3.23245090770498E-02+I*(-7.16114161533384E-02):d := -2.54502267344688E-01+I*(-1.87061604473931E-01):e := 1.53657916080625E+00+I*(3.06399902419949E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70796001608801E-02+I*(-2.96634358791002E-02):b := -4.86734100412762E-02+I*(-7.76301721385584E-01):c := -1.93447329164285E-01+I*(-3.24799080993381E-01):d := -1.79613851526738E-01+I*(-2.07307290369337E-01):e := 1.73488595763615E+00+I*(-1.73362570451822E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70303211110553E-02+I*(1.77796574073891E-01):b := 1.98501547419240E-01+I*(-3.82309742973392E-01):c := -2.71387261511432E-02+I*(-4.59413081175920E-01):d := 9.70518048085113E-02+I*(-4.01811421090575E-01):e := 1.53427455260611E+00+I*(2.36383560466463E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.48122399607910E-02+I*(4.52370891288134E-01):b := 1.80093175131674E-01+I*(-2.93870084031897E-02):c := 1.94223765061683E-01+I*(-6.62053660192239E-01):d := 1.29994150178507E-01+I*(-3.31576355043610E-01):e := -4.26359540928670E-01+I*(1.54342641884902E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.36648011005730E-02+I*(7.28170157609020E-01):b := -6.08628171244982E-02+I*(2.29134817643723E-01):c := 4.94052124781637E-01+I*(-6.74996283097154E-01):d := 1.10083220571994E-01+I*(-2.56598241548390E-01):e := -2.05513710667972E-01+I*(8.90508099066305E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.86382942332134E-01+I*(8.76144831157589E-01):b := -4.11620442645053E-01+I*(2.72290499609939E-01):c := 7.32053331274711E-01+I*(-4.92184952792222E-01):d := 4.66355612371928E-02+I*(-2.11960173198240E-01):e := -4.04409562313489E-03+I*(6.78846048136581E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.75092556802359E-01+I*(8.27055917625154E-01):b := -7.08056310212138E-01+I*(7.98870142814837E-02):c := 7.96863974934019E-01+I*(-1.99159122448745E-01):d := -3.06609628809551E-02+I*(-2.18548798271065E-01):e := 1.52309655112953E-01+I*(5.72124770875352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.64703207250674E-01+I*(6.03872665216046E-01):b := -8.11464782873419E-01+I*(-2.58047909229905E-01):c := 6.58158435301299E-01+I*(6.69711652962122E-02):d := -8.56384490923921E-02+I*(-2.73281225870879E-01):e := 2.99466878286729E-01+I*(5.02014126169034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.66493963044663E-01+I*(3.11024998138047E-01):b := -6.73459887013527E-01+I*(-5.83390764484922E-01):c := 3.80838575911064E-01+I*(1.81680591098094E-01):d := -9.25723205920874E-02+I*(-3.50547544840553E-01):e := 4.71088893065765E-01+I*(4.49924737945485E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.79626909646285E-01+I*(8.55395944562383E-02):b := -3.58615647158876E-01+I*(-7.43910013726669E-01):c := 9.46654410389302E-02+I*(9.12953397709370E-02):d := -4.82181418439358E-02+I*(-4.14193985814693E-01):e := 7.28166022141459E-01+I*(4.23405185427214E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.91539218136605E-01+I*(3.29235805444598E-02):b := -1.42511822414217E-02+I*(-6.64496916262194E-01):c := -6.64573790483054E-02+I*(-1.61892325069106E-01):d := 2.66702739740146E-02+I*(-4.34439671710099E-01):e := 1.25669403749136E+00+I*(5.59283575848152E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.72187856143850E-01+I*(6.21775206161889E-02):b := 1.53003760308361E-01+I*(-2.74536111767065E-01):c := -3.45732247751940E-02+I*(-2.52991699564325E-01):d := 4.01072493336460E-01+I*(-4.43208039722140E-01):e := 8.67944841189370E-01+I*(5.10157854995398E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.70345295072004E-01+I*(3.36751837830432E-01):b := 1.34595388020795E-01+I*(7.83866228031376E-02):c := 1.86789266437632E-01+I*(-4.55632278580645E-01):d := 4.34014838706457E-01+I*(-3.72972973675175E-01):e := 5.52567345357025E-01+I*(8.98256015111344E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.68822336133368E-01+I*(6.12551104151318E-01):b := -1.06360604235378E-01+I*(3.36908448850050E-01):c := 4.86617626157587E-01+I*(-4.68574901485559E-01):d := 4.14103909099943E-01+I*(-2.97994860179954E-01):e := 2.32798713356910E-01+I*(7.09922930064421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.21540477364929E-01+I*(7.60525777699887E-01):b := -4.57118229755932E-01+I*(3.80064130816266E-01):c := 7.24618832650660E-01+I*(-2.85763571180627E-01):d := 3.50656249765142E-01+I*(-2.53356791829804E-01):e := 2.01570413629703E-01+I*(5.17127005680227E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.10250091835153E-01+I*(7.11436864167452E-01):b := -7.53554097323017E-01+I*(1.87660645487811E-01):c := 7.89429476309968E-01+I*(7.26225916284936E-03):d := 2.73359725646994E-01+I*(-2.59945416902630E-01):e := 2.39525087668529E-01+I*(4.01057302154252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.99860742283469E-01+I*(4.88253611758344E-01):b := -8.56962569984299E-01+I*(-1.50274278023578E-01):c := 6.50723936677248E-01+I*(2.73392546907807E-01):d := 2.18382239435557E-01+I*(-3.14677844502444E-01):e := 2.97479223706537E-01+I*(3.23626781525976E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00165149807746E+00+I*(1.95405944680345E-01):b := -7.18957674124406E-01+I*(-4.75617133278594E-01):c := 3.73404077287013E-01+I*(3.88101972709688E-01):d := 2.11448367935862E-01+I*(-3.91944163472118E-01):e := 3.73554672378411E-01+I*(2.66681603033889E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.14784444679079E-01+I*(-3.00794590014637E-02):b := -4.04113434269756E-01+I*(-6.36136382520342E-01):c := 8.72309424148794E-02+I*(2.97716721382531E-01):d := 2.55802546684013E-01+I*(-4.55590604446258E-01):e := 4.82959500570954E-01+I*(2.29394100365573E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.26696753169400E-01+I*(-8.26954729132422E-02):b := -5.97489693523012E-02+I*(-5.56723285055867E-01):c := -7.38918776723561E-02+I*(4.45290565424886E-02):d := 3.30690962501964E-01+I*(-4.75836290341664E-01):e := 6.59366268907284E-01+I*(2.49012758158995E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78010484106982E-01+I*(-1.77548162647269E-01):b := 4.88748785275079E-02+I*(-2.21222134289733E-01):c := -1.72953487607834E-01+I*(-9.96425508395927E-02):d := 6.60575085915790E-01+I*(-2.79498957714630E-01):e := 6.52199418835939E-01+I*(1.02255465562207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.76167923035136E-01+I*(9.70261545669747E-02):b := 3.04665062399419E-02+I*(1.31700600280470E-01):c := 4.84090036049921E-02+I*(-3.02283129855912E-01):d := 6.93517431285787E-01+I*(-2.09263891667664E-01):e := 7.18146169790951E-01+I*(3.40408845137970E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.74644964096500E-01+I*(3.72825420887861E-01):b := -2.10489486016231E-01+I*(3.90222426327382E-01):c := 3.48237363324947E-01+I*(-3.15225752760826E-01):d := 6.73606501679273E-01+I*(-1.34285778172444E-01):e := 4.97743680981909E-01+I*(4.72277118336747E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.27363105328061E-01+I*(5.20800094436429E-01):b := -5.61247111536786E-01+I*(4.33378108293598E-01):c := 5.86238569818021E-01+I*(-1.32414422455894E-01):d := 6.10158842344472E-01+I*(-8.96477098222939E-02):e := 3.53315033099235E-01+I*(3.84837351971871E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.16072719798286E-01+I*(4.71711180903994E-01):b := -8.57682979103870E-01+I*(2.40974622965143E-01):c := 6.51049213477329E-01+I*(1.60611407887582E-01):d := 5.32862318226324E-01+I*(-9.62363348951194E-02):e := 3.16986097882950E-01+I*(2.86225239327933E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10568337024660E+00+I*(2.48527928494887E-01):b := -9.61091451765152E-01+I*(-9.69603005462455E-02):c := 5.12343673844609E-01+I*(4.26741695632539E-01):d := 4.77884832014887E-01+I*(-1.50968762494934E-01):e := 3.23957195762668E-01+I*(2.08988703675181E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10747412604059E+00+I*(-4.43197385831122E-02):b := -8.23086555905259E-01+I*(-4.22303155801262E-01):c := 2.35023814454374E-01+I*(5.41451121434421E-01):d := 4.70950960515192E-01+I*(-2.28235081464607E-01):e := 3.53922536893307E-01+I*(1.46241573159426E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.20607072642212E-01+I*(-2.69805142264921E-01):b := -5.08242316050609E-01+I*(-5.82822405043010E-01):c := -5.11493204177600E-02+I*(4.51065870107264E-01):d := 5.15305139263344E-01+I*(-2.91881522438747E-01):e := 4.07847528111844E-01+I*(9.34438484841210E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.32519381132532E-01+I*(-3.22421156176700E-01):b := -1.63877851133154E-01+I*(-5.03409307578535E-01):c := -2.12272140504996E-01+I*(1.97878205267221E-01):d := 5.90193555081294E-01+I*(-3.12127208334153E-01):e := 5.01259564359368E-01+I*(5.92528254784621E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.04982621288996E-01+I*(-4.29210164263310E-01):b := -6.51620368744437E-02+I*(-2.47314013121899E-01):c := -3.77529851744357E-01+I*(-7.11194059759731E-02):d := 7.54135435428569E-01+I*(1.27145260368603E-02):e := 5.27728970641276E-01+I*(-1.11324051516931E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.03140060217150E-01+I*(-1.54635847049067E-01):b := -8.35704091620098E-02+I*(1.05608721448303E-01):c := -1.56167360531531E-01+I*(-2.73759984992293E-01):d := 7.87077780798565E-01+I*(8.29495920838255E-02):e := 6.85437449532012E-01+I*(-3.69296527047563E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.01617101278514E-01+I*(1.21163419271819E-01):b := -3.24526401418182E-01+I*(3.64130547495216E-01):c := 1.43660999188424E-01+I*(-2.86702607897207E-01):d := 7.67166851192051E-01+I*(1.57927705579046E-01):e := 6.74216980649112E-01+I*(1.89192214035174E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.54335242510075E-01+I*(2.69138092820388E-01):b := -6.75284026938737E-01+I*(4.07286229461432E-01):c := 3.81662205681497E-01+I*(-1.03891277592275E-01):d := 7.03719191857250E-01+I*(2.02565773929196E-01):e := 4.99510441093845E-01+I*(2.45597383646599E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.43044856980300E-01+I*(2.20049179287953E-01):b := -9.71719894505822E-01+I*(2.14882744132977E-01):c := 4.46472849340805E-01+I*(1.89134552751201E-01):d := 6.26422667739102E-01+I*(1.95977148856371E-01):e := 4.00596018237289E-01+I*(1.85504261064018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.03265550742862E+00+I*(-3.13407312115473E-03):b := -1.07512836716710E+00+I*(-1.23052179378412E-01):c := 3.07767309708085E-01+I*(4.55264840496159E-01):d := 5.71445181527665E-01+I*(1.41244721256556E-01):e := 3.64092697408266E-01+I*(1.15001800710080E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.03444626322260E+00+I*(-2.95981740199154E-01):b := -9.37123471307211E-01+I*(-4.48395034633428E-01):c := 3.04474503178501E-02+I*(5.69974266298040E-01):d := 5.64511310027970E-01+I*(6.39784022868822E-02):e := 3.59200706701830E-01+I*(4.99653831818193E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.47579209824226E-01+I*(-5.21467143880962E-01):b := -6.22279231452560E-01+I*(-6.08914283875176E-01):c := -2.55725684554283E-01+I*(4.79589014970884E-01):d := 6.08865488776122E-01+I*(3.31961312742305E-04):e := 3.77366927373659E-01+I*(-1.19142471443313E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.59491518314547E-01+I*(-5.74083157792741E-01):b := -2.77914766535106E-01+I*(-5.29501186410701E-01):c := -4.16848504641519E-01+I*(2.26401350130841E-01):d := 6.83753904594072E-01+I*(-1.99137245826638E-02):e := 4.25539404602772E-01+I*(-7.16482096042856E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.72748163167180E-02+I*(-5.75053036764188E-01):b := -1.35747845801779E-01+I*(-3.40603068179060E-01):c := -5.52578762792255E-01+I*(-1.80768561454599E-01):d := 6.37975614530305E-01+I*(2.96702474893883E-01):e := 4.27887251307424E-01+I*(-2.73058943931438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.45677447551280E-02+I*(-3.00478719549945E-01):b := -1.54156218089345E-01+I*(1.23196663911418E-02):c := -3.31216271579429E-01+I*(-3.83409140470918E-01):d := 6.70917959900302E-01+I*(3.66937540940848E-01):e := 5.74752682221587E-01+I*(-3.33691031550829E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.39092963062359E-02+I*(-2.46794532290589E-02):b := -3.95112210345517E-01+I*(2.70841492438055E-01):c := -3.13879118594738E-02+I*(-3.96351763375833E-01):d := 6.51007030293788E-01+I*(4.41915654436068E-01):e := 7.74618694675615E-01+I*(-1.84723169004380E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.36627437537797E-01+I*(1.23295220319509E-01):b := -7.45869835866072E-01+I*(3.13997174404270E-01):c := 2.06613294633600E-01+I*(-2.13540433070900E-01):d := 5.87559370958987E-01+I*(4.86553722786218E-01):e := 6.81231859320329E-01+I*(5.39731698290187E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.25337052008021E-01+I*(7.42063067870751E-02):b := -1.04230570343316E+00+I*(1.21593689075816E-01):c := 2.71423938292908E-01+I*(7.94853972725757E-02):d := 5.10262846840839E-01+I*(4.79965097713393E-01):e := 5.14999675023934E-01+I*(7.43866954563956E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.14947702456337E-01+I*(-1.48976945622033E-01):b := -1.14571417609444E+00+I*(-2.16341234435573E-01):c := 1.32718398660188E-01+I*(3.45615685017533E-01):d := 4.55285360629402E-01+I*(4.25232670113578E-01):e := 4.25662669623492E-01+I*(2.02871672567989E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.16738458250326E-01+I*(-4.41824612700032E-01):b := -1.00770928023455E+00+I*(-5.41684089690590E-01):c := -1.44601460730047E-01+I*(4.60325110819415E-01):d := 4.48351489129707E-01+I*(3.47966351143905E-01):e := 3.82857217961658E-01+I*(-4.41438891385157E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.29871404851948E-01+I*(-6.67310016381841E-01):b := -6.92865040379896E-01+I*(-7.02203338932337E-01):c := -4.30774595602181E-01+I*(3.69939859492258E-01):d := 4.92705667877859E-01+I*(2.84319910169765E-01):e := 3.66852673500838E-01+I*(-1.11899542854305E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.41783713342268E-01+I*(-7.19926030293619E-01):b := -3.48500575462441E-01+I*(-6.22790241467862E-01):c := -5.91897415689417E-01+I*(1.16752194652215E-01):d := 5.67594083695809E-01+I*(2.64074224274359E-01):e := 3.75844444554408E-01+I*(-1.87216903610322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.73245029310584E-01+I*(-5.46835279243762E-01):b := -1.29854663783513E-01+I*(-4.57438313807612E-01):c := -6.16192889820271E-01+I*(-3.77283958812399E-01):d := 3.66448094391907E-01+I*(4.39583771411750E-01):e := 3.24191063986891E-01+I*(-4.33015893471689E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.75087590382430E-01+I*(-2.72260962029518E-01):b := -1.48263036071079E-01+I*(-1.04515579237410E-01):c := -3.94830398607446E-01+I*(-5.79924537828718E-01):d := 3.99390439761903E-01+I*(5.09818837458716E-01):e := 3.85387079971977E-01+I*(-6.05287820474671E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76610549321067E-01+I*(3.53830429136776E-03):b := -3.89219028327251E-01+I*(1.54006246809503E-01):c := -9.50020388874905E-02+I*(-5.92867160733632E-01):d := 3.79479510155389E-01+I*(5.84796950953936E-01):e := 7.01542618285681E-01+I*(-7.46279888672864E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.61075919104946E-02+I*(1.51512977839936E-01):b := -7.39976653847807E-01+I*(1.97161928775719E-01):c := 1.42999167605583E-01+I*(-4.10055830428700E-01):d := 3.16031850820588E-01+I*(6.29435019304086E-01):e := 9.91744843229252E-01+I*(-3.33310198993654E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.64817206380719E-01+I*(1.02424064307502E-01):b := -1.03641252141489E+00+I*(4.75844344726445E-03):c := 2.07809811264891E-01+I*(-1.17030000085224E-01):d := 2.38735326702440E-01+I*(6.22846394231261E-01):e := 7.32634383480835E-01+I*(-7.89118632053394E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.54427856829035E-01+I*(-1.20759188101606E-01):b := -1.13982099407617E+00+I*(-3.33176480064124E-01):c := 6.91042716321714E-02+I*(1.49100287659733E-01):d := 1.83757840491003E-01+I*(5.68113966631446E-01):e := 5.42224393168001E-01+I*(-9.33446725772980E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.56218612623024E-01+I*(-4.13606855179605E-01):b := -1.00181609821628E+00+I*(-6.58519335319141E-01):c := -2.08215587758064E-01+I*(2.63809713461615E-01):d := 1.76823968991308E-01+I*(4.90847647661773E-01):e := 4.38795012503875E-01+I*(-1.55433935353830E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.69351559224645E-01+I*(-6.39092258861414E-01):b := -6.86971858361630E-01+I*(-8.19038584560889E-01):c := -4.94388722630198E-01+I*(1.73424462134458E-01):d := 2.21178147739459E-01+I*(4.27201206687633E-01):e := 3.76034279523469E-01+I*(-2.28741708975623E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.12638677149659E-02+I*(-6.91708272773193E-01):b := -3.42607393444175E-01+I*(-7.39625487096414E-01):c := -6.55511542717434E-01+I*(-7.97632027055846E-02):d := 2.96066563557410E-01+I*(4.06955520792226E-01):e := 3.36719959116593E-01+I*(-3.16030031895486E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.05241930276297E-01+I*(-3.31658450853778E-01):b := -1.50753440183892E-01+I*(-7.84059112663697E-01):c := -8.23339173107924E-02+I*(-4.80231366108198E-01):d := -1.50479647651130E-01+I*(2.96635518232793E-01):e := -2.00118062460370E-01+I*(-5.91481094771562E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07084491348143E-01+I*(-5.70841336395350E-02):b := -1.69161812471458E-01+I*(-4.31136378093495E-01):c := 1.39028573902033E-01+I*(-6.82871945124518E-01):d := -1.17537302281134E-01+I*(3.66870584279758E-01):e := -3.90959947206075E-01+I*(-5.43247984568555E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.08607450286779E-01+I*(2.18715132681351E-01):b := -4.10117804727630E-01+I*(-1.72614552046582E-01):c := 4.38856933621988E-01+I*(-6.95814568029432E-01):d := -1.37448231887647E-01+I*(4.41848697774979E-01):e := -6.49060875683691E-01+I*(-5.10045144657953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55889309055218E-01+I*(3.66689806229919E-01):b := -7.60875430248185E-01+I*(-1.29458870080367E-01):c := 6.76858140115062E-01+I*(-5.13003237724500E-01):d := -2.00895891222448E-01+I*(4.86486766125129E-01):e := -1.13842450061822E+00+I*(-5.43773125519887E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32820305415007E-01+I*(3.17600892697485E-01):b := -1.05731129781527E+00+I*(-3.21862355408821E-01):c := 7.41668783774370E-01+I*(-2.19977407381024E-01):d := -2.78192415340596E-01+I*(4.79898141052304E-01):e := -2.53565939164140E+00+I*(-1.70148434703588E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.22430955863322E-01+I*(9.44176402883771E-02):b := -1.16071977047655E+00+I*(-6.59797278920210E-01):c := 6.02963244141650E-01+I*(4.61528803639334E-02):d := -3.33169901552033E-01+I*(4.25165713452489E-01):e := 1.14640682178558E+00+I*(-2.33046397861476E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.24221711657311E-01+I*(-1.98430026789622E-01):b := -1.02271487461666E+00+I*(-9.85140134175227E-01):c := 3.25643384751414E-01+I*(1.60862306165815E-01):d := -3.40103773051728E-01+I*(3.47899394482815E-01):e := 5.51394663709160E-01+I*(-1.03048820390513E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.37354658258933E-01+I*(-4.23915430471431E-01):b := -7.07870634762008E-01+I*(-1.14565938341697E+00):c := 3.94702498792811E-02+I*(7.04770548386581E-02):d := -2.95749594303577E-01+I*(2.84252953508675E-01):e := 2.01730482741228E-01+I*(-7.68105031427244E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.50733033250747E-01+I*(-4.76531444383210E-01):b := -3.63506169844554E-01+I*(-1.06624628595250E+00):c := -1.21652570207955E-01+I*(-1.82710610001385E-01):d := -2.20861178485627E-01+I*(2.64007267613269E-01):e := -1.83007310695634E-02+I*(-6.57786603093729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.22691660336813E-01+I*(-7.01965248951980E-02):b := -3.46698441456772E-02+I*(-7.98543688812863E-01):c := 1.00149492361156E-01+I*(-5.77003592241167E-01):d := -3.38340515280816E-01+I*(5.40441880073353E-02):e := -4.78089888699620E-01+I*(-4.88673672600941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.24534221408659E-01+I*(2.04377792319045E-01):b := -5.30782164332431E-02+I*(-4.45620954242661E-01):c := 3.21511983573981E-01+I*(-7.79644171257487E-01):d := -3.05398169910820E-01+I*(1.24279254054301E-01):e := -5.61837005015157E-01+I*(-3.01257952619346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.26057180347295E-01+I*(4.80177058639931E-01):b := -2.94034208689416E-01+I*(-1.87099128195748E-01):c := 6.21340343293936E-01+I*(-7.92586794162401E-01):d := -3.25309099517333E-01+I*(1.99257367549521E-01):e := -6.60207780287298E-01+I*(-1.25097383125890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.73339039115735E-01+I*(6.28151732188500E-01):b := -6.44791834209970E-01+I*(-1.43943446229532E-01):c := 8.59341549787010E-01+I*(-6.09775463857469E-01):d := -3.88756758852134E-01+I*(2.43895435899671E-01):e := -8.07326425397004E-01+I*(8.55573002590205E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15370575354490E-01+I*(5.79062818656066E-01):b := -9.41227701777056E-01+I*(-3.36346931557987E-01):c := 9.24152193446318E-01+I*(-3.16749633513993E-01):d := -4.66053282970282E-01+I*(2.37306810826846E-01):e := -1.12556795355602E+00+I*(4.16135010351913E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.04981225802806E-01+I*(3.55879566246958E-01):b := -1.04463617443834E+00+I*(-6.74281855069376E-01):c := 7.85446653813598E-01+I*(-5.06193457690358E-02):d := -5.21030769181719E-01+I*(1.82574383227031E-01):e := -2.58791754187777E+00+I*(9.59442271735051E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.06771981596795E-01+I*(6.30318991689583E-02):b := -9.06631278578444E-01+I*(-9.99624710324392E-01):c := 5.08126794423363E-01+I*(6.40900800328458E-02):d := -5.27964640681415E-01+I*(1.05308064257357E-01):e := -1.16087063596511E+00+I*(-3.09902560257554E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19904928198416E-01+I*(-1.62453504512850E-01):b := -5.91787038723794E-01+I*(-1.16014395956614E+00):c := 2.21953659551229E-01+I*(-2.62951712943107E-02):d := -4.83610461933263E-01+I*(4.16616232832175E-02):e := -3.19964795624485E-01+I*(-1.25829790673516E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.68182763311263E-01+I*(-2.15069518424629E-01):b := -2.47422573806339E-01+I*(-1.08073086210167E+00):c := 6.08308394639935E-02+I*(-2.79482836134354E-01):d := -4.08722046115313E-01+I*(2.14159373878114E-02):e := -3.93630510541664E-01+I*(-7.47151338753335E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67994442672643E-01+I*(1.41311400847833E-01):b := 6.35658556169101E-02+I*(-7.35022420661644E-01):c := 3.02143882221812E-01+I*(-5.33837343608100E-01):d := -3.26315587721746E-01+I*(-2.52546190518043E-01):e := -8.16327116098479E-01+I*(-2.62339258284190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69837003744489E-01+I*(4.15885718062076E-01):b := 4.51574833293444E-02+I*(-3.82099686091442E-01):c := 5.23506373434637E-01+I*(-7.36477922624419E-01):d := -2.93373242351750E-01+I*(-1.82311124471078E-01):e := -6.79492695021781E-01+I*(-2.42691165903410E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.71359962683125E-01+I*(6.91684984382962E-01):b := -1.95798508926828E-01+I*(-1.23577860044528E-01):c := 8.23334733154592E-01+I*(-7.49420545529333E-01):d := -3.13284171958263E-01+I*(-1.07333010975857E-01):e := -6.02788271632805E-01+I*(1.60152480446670E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.86418214515641E-02+I*(8.39659657931530E-01):b := -5.46556134447383E-01+I*(-8.04221780783130E-02):c := 1.06133593964767E+00+I*(-5.66609215224401E-01):d := -3.76731831293064E-01+I*(-6.26949426257070E-02):e := -5.48579249123244E-01+I*(3.42185403500977E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.70067793018661E-01+I*(7.90570744399096E-01):b := -8.42992002014468E-01+I*(-2.72825663406768E-01):c := 1.12614658330697E+00+I*(-2.73583384880925E-01):d := -4.54028355411212E-01+I*(-6.92835676985322E-02):e := -5.07858609430102E-01+I*(5.71397772756060E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.59678443466976E-01+I*(5.67387491989988E-01):b := -9.46400474675750E-01+I*(-6.10760586918156E-01):c := 9.87441043674254E-01+I*(-7.45309713596814E-03):d := -5.09005841622650E-01+I*(-1.24015995298346E-01):e := -5.04763177892414E-01+I*(9.62815017572223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.61469199260965E-01+I*(2.74539824911988E-01):b := -8.08395578815857E-01+I*(-9.36103442173173E-01):c := 7.10121184284018E-01+I*(1.07256328665913E-01):d := -5.15939713122345E-01+I*(-2.01282314268020E-01):e := -9.57122432933494E-01+I*(2.00821360472275E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.74602145862586E-01+I*(4.90544212301799E-02):b := -4.93551338961207E-01+I*(-1.09662269141492E+00):c := 4.23948049411885E-01+I*(1.68710773387565E-02):d := -4.71585534374193E-01+I*(-2.64928755242160E-01):e := -3.45757985091326E+00+I*(-7.19703844457631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.34855456470929E-02+I*(-3.56159268159864E-03):b := -1.49186874043752E-01+I*(-1.01720959395045E+00):c := 2.62825229324650E-01+I*(-2.36316587501286E-01):d := -3.96697118556243E-01+I*(-2.85174441137566E-01):e := -1.18936893200904E+00+I*(-6.67628133476938E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.35348246969177E-02+I*(2.03898417271393E-01):b := 9.79880834167646E-02+I*(-6.23217615538253E-01):c := 4.29133832337792E-01+I*(-3.70930587683825E-01):d := -1.20031462220994E-01+I*(-4.79678571858805E-01):e := -1.24271649827601E+00+I*(3.83994023652282E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15377385768764E-01+I*(4.78472734485636E-01):b := 7.95797111291989E-02+I*(-2.70294880968051E-01):c := 6.50496323550617E-01+I*(-5.73571166700144E-01):d := -8.70891168509979E-02+I*(-4.09443505811840E-01):e := -7.39616285539283E-01+I*(3.59181156055037E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.69003447073998E-02+I*(7.54272000806522E-01):b := -1.61376281126974E-01+I*(-1.17730549211384E-02):c := 9.50324683270572E-01+I*(-5.86513789605058E-01):d := -1.07000046457511E-01+I*(-3.34465392316619E-01):e := -4.95521292110387E-01+I*(4.20250042116899E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.35817796524161E-01+I*(9.02246674355090E-01):b := -5.12133906647529E-01+I*(3.13826270450770E-02):c := 1.18832588976365E+00+I*(-4.03702459300126E-01):d := -1.70447705792313E-01+I*(-2.89827323966469E-01):e := -3.29333012283186E-01+I*(4.93148279780581E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.24527410994386E-01+I*(8.53157760822656E-01):b := -8.08569774214613E-01+I*(-1.61020858283378E-01):c := 1.25313653342295E+00+I*(-1.10676628956650E-01):d := -2.47744229910461E-01+I*(-2.96415949039295E-01):e := -1.83929095919177E-01+I*(5.82304988261205E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.14138061442701E-01+I*(6.29974508413548E-01):b := -9.11978246875895E-01+I*(-4.98955781794766E-01):c := 1.11443099379023E+00+I*(1.55453658788307E-01):d := -3.02721716121898E-01+I*(-3.51148376639109E-01):e := -2.62148029972019E-02+I*(7.14090162768580E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.15928817236690E-01+I*(3.37126841335549E-01):b := -7.73973351016002E-01+I*(-8.24298637049783E-01):c := 8.37111134399999E-01+I*(2.70163084590188E-01):d := -3.09655587621593E-01+I*(-4.28414695608783E-01):e := 1.80121663053659E-01+I*(9.77336835961151E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.29061763838312E-01+I*(1.11641437653740E-01):b := -4.59129111161352E-01+I*(-9.84817886291530E-01):c := 5.50937999527865E-01+I*(1.79777833263032E-01):d := -2.65301408873441E-01+I*(-4.92061136582923E-01):e := 3.44045388411872E-01+I*(1.83634352349771E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.40974072328632E-01+I*(5.90254237419615E-02):b := -1.14764646243897E-01+I*(-9.05404788827055E-01):c := 3.89815179440630E-01+I*(-7.34098315770110E-02):d := -1.90412993055491E-01+I*(-5.12306822478329E-01):e := -2.19537883025338E+00+I*(1.87351176877060E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21622710335877E-01+I*(8.82793638136904E-02):b := 5.24902963058854E-02+I*(-5.15443984331926E-01):c := 4.21699333713741E-01+I*(-1.64509206072230E-01):d := 1.83989226306955E-01+I*(-5.21075190490370E-01):e := -3.71523568479516E-01+I*(2.25002088138130E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19780149264031E-01+I*(3.62853681027934E-01):b := 3.40819240183194E-02+I*(-1.62521249761724E-01):c := 6.43061824926566E-01+I*(-3.67149785088550E-01):d := 2.16931571676951E-01+I*(-4.50840124443404E-01):e := -5.91260856651113E-01+I*(1.01118700101227E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.18257190325395E-01+I*(6.38652947348820E-01):b := -2.06874068237853E-01+I*(9.60005762851890E-02):c := 9.42890184646521E-01+I*(-3.80092407993464E-01):d := 1.97020642070438E-01+I*(-3.75862010948184E-01):e := -2.99767617845397E-01+I*(7.05076217328145E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70975331556956E-01+I*(7.86627620897388E-01):b := -5.57631693758408E-01+I*(1.39156258251404E-01):c := 1.18089139113960E+00+I*(-1.97281077688532E-01):d := 1.33572982735637E-01+I*(-3.31223942598034E-01):e := -1.02763957096874E-01+I*(6.04405641196203E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.59684946027180E-01+I*(7.37538707364953E-01):b := -8.54067561325493E-01+I*(-5.32472270770504E-02):c := 1.24570203479890E+00+I*(9.57447526549443E-02):d := 5.62764586174887E-02+I*(-3.37812567670859E-01):e := 5.39016782670839E-02+I*(5.60688122126341E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.49295596475496E-01+I*(5.14355454955846E-01):b := -9.57476033986775E-01+I*(-3.91182150588439E-01):c := 1.10699649516618E+00+I*(3.61875040399902E-01):d := 1.29897240605160E-03+I*(-3.92544995270674E-01):e := 2.07548724655833E-01+I*(5.44223615159518E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.51086352269484E-01+I*(2.21507787877846E-01):b := -8.19471138126881E-01+I*(-7.16525005843456E-01):c := 8.29676635775947E-01+I*(4.76584466201783E-01):d := -5.63489909364360E-03+I*(-4.69811314240347E-01):e := 3.94450023945038E-01+I*(5.57621063497705E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.64219298871106E-01+I*(-3.97761580396209E-03):b := -5.04626898272231E-01+I*(-8.77044255085203E-01):c := 5.43503500903814E-01+I*(3.86199214874626E-01):d := 3.87192796545080E-02+I*(-5.33457755214487E-01):e := 6.82732178526733E-01+I*(6.55915298508993E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.76131607361427E-01+I*(-5.65936297157406E-02):b := -1.60262433354777E-01+I*(-7.97631157620728E-01):c := 3.82380680816579E-01+I*(1.33011550034583E-01):d := 1.13607695472458E-01+I*(-5.53703441109893E-01):e := 1.15796017696605E+00+I*(1.24789310001311E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27445338299009E-01+I*(-1.51446319449767E-01):b := -5.16385854749679E-02+I*(-4.62130006854594E-01):c := 2.83319070881101E-01+I*(-1.11600573474977E-02):d := 4.43491818886285E-01+I*(-3.57366108482859E-01):e := 1.62336471186443E+00+I*(4.67976046709738E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25602777227163E-01+I*(1.23127997764476E-01):b := -7.00469577625338E-02+I*(-1.09207272284392E-01):c := 5.04681562093927E-01+I*(-2.13800636363817E-01):d := 4.76434164256281E-01+I*(-2.87131042435894E-01):e := 7.95435955857500E-01+I*(1.78002592283556E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.24079818288527E-01+I*(3.98927264085362E-01):b := -3.11002950018706E-01+I*(1.49314553762521E-01):c := 8.04509921813882E-01+I*(-2.26743259268731E-01):d := 4.56523234649768E-01+I*(-2.12152928940673E-01):e := 1.46111344591120E-01+I*(1.05212322181134E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.76797959520088E-01+I*(5.46901937633931E-01):b := -6.61760575539261E-01+I*(1.92470235728736E-01):c := 1.04251112830696E+00+I*(-4.39319289637998E-02):d := 3.93075575314967E-01+I*(-1.67514860590523E-01):e := 1.90199798288665E-01+I*(6.94549945287673E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.65507573990313E-01+I*(4.97813024101496E-01):b := -9.58196443106346E-01+I*(6.67504002816263E-05):c := 1.10732177196626E+00+I*(2.49093901379677E-01):d := 3.15779051196819E-01+I*(-1.74103485663348E-01):e := 2.79168867132822E-01+I*(5.16419335324902E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05511822443863E+00+I*(2.74629771692388E-01):b := -1.06160491576763E+00+I*(-3.37868173111107E-01):c := 9.68616232333543E-01+I*(5.15224189124634E-01):d := 2.60801564985382E-01+I*(-2.28835913263163E-01):e := 3.73618242528485E-01+I*(3.98543812089597E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05690898023262E+00+I*(-1.82178953856111E-02):b := -9.23600019907735E-01+I*(-6.63211028366124E-01):c := 6.91296372943308E-01+I*(6.29933614926515E-01):d := 2.53867693485686E-01+I*(-3.06102232232837E-01):e := 4.84606438038463E-01+I*(3.02230232277729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.70041926834238E-01+I*(-2.43703299067419E-01):b := -6.08755780053084E-01+I*(-8.23730277607871E-01):c := 4.05123238071175E-01+I*(5.39548363599358E-01):d := 2.98221872233838E-01+I*(-3.69748673206977E-01):e := 6.43158415377399E-01+I*(2.12453055433078E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.81954235324559E-01+I*(-2.96319312979198E-01):b := -2.64391315135630E-01+I*(-7.44317180143396E-01):c := 2.44000417983939E-01+I*(2.86360698759316E-01):d := 3.73110288051788E-01+I*(-3.89994359102383E-01):e := 9.39015284033775E-01+I*(1.46214906828519E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.54417475481024E-01+I*(-4.03108321065808E-01):b := -1.65675500876920E-01+I*(-4.88221885686761E-01):c := 7.87427067445780E-02+I*(1.73630875161218E-02):d := 5.37052168399063E-01+I*(-6.51526247313692E-02):e := 8.94200985931636E-01+I*(-4.57345899336546E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52574914409177E-01+I*(-1.28534003851565E-01):b := -1.84083873164485E-01+I*(-1.35299151116558E-01):c := 3.00105197957404E-01+I*(-1.85277491500198E-01):d := 5.69994513769059E-01+I*(5.08244131559593E-03):e := 1.75712369308432E+00+I*(-4.97004327403518E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.51051955470541E-01+I*(1.47265262469321E-01):b := -4.25039865420658E-01+I*(1.23222674930355E-01):c := 5.99933557677358E-01+I*(-1.98220114405112E-01):d := 5.50083584162546E-01+I*(8.00605548108164E-02):e := 1.49413478356302E+00+I*(1.05295948094076E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.03770096702102E-01+I*(2.95239936017890E-01):b := -7.75797490941213E-01+I*(1.66378356896570E-01):c := 8.37934764170432E-01+I*(-1.54087841001802E-02):d := 4.86635924827745E-01+I*(1.24698623160966E-01):e := 6.91521252885356E-01+I*(7.29453862220313E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.92479711172327E-01+I*(2.46151022485455E-01):b := -1.07223335850830E+00+I*(-2.60251284318845E-02):c := 9.02745407829740E-01+I*(2.77617046243296E-01):d := 4.09339400709597E-01+I*(1.18109998088141E-01):e := 5.50581345213302E-01+I*(4.30194342547594E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.82090361620642E-01+I*(2.29677700763468E-02):b := -1.17564183116958E+00+I*(-3.63960051943273E-01):c := 7.64039868197020E-01+I*(5.43747333988253E-01):d := 3.54361914498160E-01+I*(6.33775704883268E-02):e := 5.26809322042057E-01+I*(2.41027192125069E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.83881117414631E-01+I*(-2.69879897001652E-01):b := -1.03763693530969E+00+I*(-6.89302907198290E-01):c := 4.86720008806785E-01+I*(6.58456759790135E-01):d := 3.47428042998465E-01+I*(-1.38887484813470E-02):e := 5.38679419986224E-01+I*(9.23688945397064E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.97014064016253E-01+I*(-4.95365300683461E-01):b := -7.22792695455036E-01+I*(-8.49822156440038E-01):c := 2.00546873934651E-01+I*(5.68071508462978E-01):d := 3.91782221746616E-01+I*(-7.75351894554869E-02):e := 5.76903221229560E-01+I*(-5.17516802015342E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.08926372506573E-01+I*(-5.47981314595240E-01):b := -3.78428230537582E-01+I*(-7.70409058975562E-01):c := 3.94240538474157E-02+I*(3.14883843622935E-01):d := 4.66670637564567E-01+I*(-9.77808753508929E-02):e := 6.62150248683836E-01+I*(-2.22157134958706E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67096705087452E-02+I*(-5.48951193566687E-01):b := -2.36261309804255E-01+I*(-5.81510940743922E-01):c := -9.63062043033194E-02+I*(-9.22860679625037E-02):d := 4.20892347500800E-01+I*(2.18835324125653E-01):e := 4.03791701903336E-01+I*(-6.22762600602463E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.51328905631010E-02+I*(-2.74376876352443E-01):b := -2.54669682091821E-01+I*(-2.28588206173720E-01):c := 1.25056286909506E-01+I*(-2.94926646978823E-01):d := 4.53834692870796E-01+I*(2.89070390172619E-01):e := 4.54364456703524E-01+I*(-1.00499907331304E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.33441504982630E-02+I*(1.42238996844267E-03):b := -4.95625674347993E-01+I*(2.99336198731935E-02):c := 4.24884646629461E-01+I*(-3.07869269883738E-01):d := 4.33923763264283E-01+I*(3.64048503667839E-01):e := 1.35177577535942E+00+I*(-1.66569239355909E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.86062291729824E-01+I*(1.49397063517011E-01):b := -8.46383299868548E-01+I*(7.30893018394087E-02):c := 6.62885853122535E-01+I*(-1.25057939578806E-01):d := 3.70476103929482E-01+I*(4.08686572017989E-01):e := 1.86977937572506E+00+I*(1.58106845191579E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.74771906200049E-01+I*(1.00308149984577E-01):b := -1.14281916743563E+00+I*(-1.19314183489046E-01):c := 7.27696496781843E-01+I*(1.67967890764671E-01):d := 2.93179579811334E-01+I*(4.02097946945164E-01):e := 9.83228046869836E-01+I*(2.05927048348450E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.64382556648364E-01+I*(-1.22875102424531E-01):b := -1.24622764009691E+00+I*(-4.57249107000434E-01):c := 5.88990957149123E-01+I*(4.34098178509628E-01):d := 2.38202093599897E-01+I*(3.47365519345349E-01):e := 7.05518825560685E-01+I*(2.04449008337370E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.66173312442353E-01+I*(-4.15722769502531E-01):b := -1.10822274423702E+00+I*(-7.82591962255452E-01):c := 3.11671097758887E-01+I*(5.48807604311509E-01):d := 2.31268222100201E-01+I*(2.70099200375676E-01):e := 5.77383486108742E-01+I*(-1.28738672507052E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.79306259043975E-01+I*(-6.41208173184339E-01):b := -7.93378504382372E-01+I*(-9.43111211497199E-01):c := 2.54979628867540E-02+I*(4.58422352984353E-01):d := 2.75622400848353E-01+I*(2.06452759401536E-01):e := 4.98146893671107E-01+I*(-2.64439438942164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.91218567534295E-01+I*(-6.93824187096118E-01):b := -4.49014039464917E-01+I*(-8.63698114032724E-01):c := -1.35624857200482E-01+I*(2.05234688144310E-01):d := 3.50510816666304E-01+I*(1.86207073506130E-01):e := 4.40660469766749E-01+I*(-4.14510618248685E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.23810175118557E-01+I*(-5.20733436046260E-01):b := -2.30368127785989E-01+I*(-6.98346186372473E-01):c := -1.59920331331336E-01+I*(-2.88801465320303E-01):d := 1.49364827362401E-01+I*(3.61716620643521E-01):e := 7.39572253803506E-02+I*(-6.36336562045138E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.25652736190403E-01+I*(-2.46159118832017E-01):b := -2.48776500073555E-01+I*(-3.45423451802271E-01):c := 6.14421598814896E-02+I*(-4.91442044336623E-01):d := 1.82307172732397E-01+I*(4.31951686690486E-01):e := -1.13089659554625E-01+I*(-7.86154539683341E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.27175695129039E-01+I*(2.96401474888694E-02):b := -4.89732492329727E-01+I*(-8.69016257553580E-02):c := 3.61270519601445E-01+I*(-5.04384667241537E-01):d := 1.62396243125884E-01+I*(5.06929800185707E-01):e := -3.81680843299991E-01+I*(-1.15229908758233E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.55424461025216E-02+I*(1.77614821037438E-01):b := -8.40490117850282E-01+I*(-4.37459437891427E-02):c := 5.99271726094518E-01+I*(-3.21573336936605E-01):d := 9.89485837910825E-02+I*(5.51567868535857E-01):e := -1.54062345757159E-01+I*(-2.65657414744463E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.14252060572746E-01+I*(1.28525907505003E-01):b := -1.13692598541737E+00+I*(-2.36149429117597E-01):c := 6.64082369753826E-01+I*(-2.85475065931291E-02):d := 2.16520596729347E-02+I*(5.44979243463032E-01):e := 1.87891281668422E+00+I*(-9.62795128770193E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.03862711021061E-01+I*(-9.46573449041044E-02):b := -1.24033445807865E+00+I*(-5.74084352628986E-01):c := 5.25376830121106E-01+I*(2.37582781151828E-01):d := -3.33254265385025E-02+I*(4.90246815863217E-01):e := 9.71052853844032E-01+I*(-4.26272773664340E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.05653466815051E-01+I*(-3.87505011982104E-01):b := -1.10232956221876E+00+I*(-8.99427207884003E-01):c := 2.48056970730871E-01+I*(3.52292206953710E-01):d := -4.02592980381977E-02+I*(4.12980496893543E-01):e := 6.01311032302230E-01+I*(-4.31850853912819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.18786413416672E-01+I*(-6.12990415663912E-01):b := -7.87485322364105E-01+I*(-1.05994645712575E+00):c := -3.81161641412626E-02+I*(2.61906955626553E-01):d := 4.09488070995388E-03+I*(3.49334055919403E-01):e := 3.90806903062314E-01+I*(-4.82634149162066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.06987219069929E-02+I*(-6.65606429575691E-01):b := -4.43120857446651E-01+I*(-9.80533359661275E-01):c := -1.99238984228498E-01+I*(8.71929078651021E-03):d := 7.89832965279042E-02+I*(3.29088370023997E-01):e := 2.29730109603473E-01+I*(-5.47723105863626E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.27199137840660E-01+I*(-2.79160629709811E-01):b := -7.28986251809908E-02+I*(-1.03321405901309E+00):c := 2.10315690176447E-01+I*(-1.19163496418603E-01):d := -2.66723038337784E-01+I*(9.74473857684428E-02):e := -4.95544152978250E-01+I*(-3.80549932166762E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.29041698912507E-01+I*(-4.58631249556780E-03):b := -9.13069974685567E-02+I*(-6.80291324442888E-01):c := 4.31678181389272E-01+I*(-3.21804075434923E-01):d := -2.33780692967788E-01+I*(1.67682451815408E-01):e := -5.24973777149828E-01+I*(-2.16094817650265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.30564657851142E-01+I*(2.71212953825318E-01):b := -3.32262989724729E-01+I*(-4.21769498395975E-01):c := 7.31506541109228E-01+I*(-3.34746698339837E-01):d := -2.53691622574301E-01+I*(2.42660565310628E-01):e := -5.76856391193135E-01+I*(-6.96470373984175E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.77846516619581E-01+I*(4.19187627373887E-01):b := -6.83020615245284E-01+I*(-3.78613816429759E-01):c := 9.69507747602301E-01+I*(-1.51935368034905E-01):d := -3.17139281909103E-01+I*(2.87298633660778E-01):e := -6.67248843273708E-01+I*(9.09593464179836E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10863097850643E-01+I*(3.70098713841452E-01):b := -9.79456482812369E-01+I*(-5.71017301758214E-01):c := 1.03431839126161E+00+I*(1.41090462308571E-01):d := -3.94435806027250E-01+I*(2.80710008587953E-01):e := -8.66602973919329E-01+I*(3.03237902302206E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.00473748298959E-01+I*(1.46915461432345E-01):b := -1.08286495547365E+00+I*(-9.08952225269602E-01):c := 8.95612851628890E-01+I*(4.07220750053529E-01):d := -4.49413292238687E-01+I*(2.25977580988138E-01):e := -1.53331674389660E+00+I*(5.14563186677012E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02264504092948E-01+I*(-1.45932205645655E-01):b := -9.44860059613758E-01+I*(-1.23429508052462E+00):c := 6.18292992238654E-01+I*(5.21930175855410E-01):d := -4.56347163738383E-01+I*(1.48711262018465E-01):e := -2.08236779159898E+00+I*(-1.25379994573275E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15397450694569E-01+I*(-3.71417609327464E-01):b := -6.30015819759107E-01+I*(-1.39481432976637E+00):c := 3.32119857366520E-01+I*(4.31544924528254E-01):d := -4.11992984990231E-01+I*(8.50648210443247E-02):e := -6.74402028988133E-01+I*(-1.04453240715273E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.72690240815110E-01+I*(-4.24033623239242E-01):b := -2.85651354841653E-01+I*(-1.31540123230189E+00):c := 1.70997037279285E-01+I*(1.78357259688211E-01):d := -3.37104569172281E-01+I*(6.48191351489188E-02):e := -5.01595274766061E-01+I*(-6.13729142668089E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.44648867901177E-01+I*(-1.76987037512306E-02):b := 4.31849708572240E-02+I*(-1.04769863516226E+00):c := 3.92799099848395E-01+I*(-2.15935722551572E-01):d := -4.54583905967470E-01+I*(-1.45143944457015E-01):e := -5.20431617919184E-01+I*(-1.47252969527232E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.46491428973023E-01+I*(2.56875613463012E-01):b := 2.47765985696578E-02+I*(-6.94775900592054E-01):c := 6.14161591061220E-01+I*(-4.18576301567892E-01):d := -4.21641560597474E-01+I*(-7.49088784100500E-02):e := -4.63592994183865E-01+I*(-4.31497511560018E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.48014387911659E-01+I*(5.32674879783898E-01):b := -2.16179393686515E-01+I*(-4.36254074545141E-01):c := 9.13989950781176E-01+I*(-4.31518924472805E-01):d := -4.41552490203987E-01+I*(6.92350851703634E-05):e := -4.44445740898923E-01+I*(5.31236330652320E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.95296246680098E-01+I*(6.80649553332467E-01):b := -5.66937019207069E-01+I*(-3.93098392578925E-01):c := 1.15199115727425E+00+I*(-2.48707594167874E-01):d := -5.05000149538788E-01+I*(4.47073034353204E-02):e := -4.52696018089298E-01+I*(1.53566349208366E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.34133677901267E-02+I*(6.31560639800033E-01):b := -8.63372886774155E-01+I*(-5.85501877907380E-01):c := 1.21680180093356E+00+I*(4.43182361756026E-02):d := -5.82296673656936E-01+I*(3.81186783624952E-02):e := -5.03272686000198E-01+I*(2.72028913562095E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.83024018238442E-01+I*(4.08377387390925E-01):b := -9.66781359435436E-01+I*(-9.23436801418769E-01):c := 1.07809626130084E+00+I*(3.10448523920559E-01):d := -6.37274159868374E-01+I*(-1.66137492373193E-02):e := -6.65237141411213E-01+I*(4.05605518847645E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.84814774032431E-01+I*(1.15529720312926E-01):b := -8.28776463575544E-01+I*(-1.24877965667379E+00):c := 8.00776401910602E-01+I*(4.25157949722441E-01):d := -6.44208031368069E-01+I*(-9.38800682069930E-02):e := -1.06374996244722E+00+I*(3.19856073979839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.79477206340526E-02+I*(-1.09955683368883E-01):b := -5.13932223720893E-01+I*(-1.40929890591553E+00):c := 5.14603267038468E-01+I*(3.34772698395285E-01):d := -5.99853852619917E-01+I*(-1.57526509181133E-01):e := -1.01006083660673E+00+I*(-2.18099846675822E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.90139970875627E-01+I*(-1.62571697280662E-01):b := -1.69567758803438E-01+I*(-1.32988580845106E+00):c := 3.53480446951233E-01+I*(8.15850335552418E-02):d := -5.24965436801967E-01+I*(-1.77772195076539E-01):e := -6.65178586241005E-01+I*(-2.57022064074359E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.89951650237007E-01+I*(1.93809221991800E-01):b := 1.41420670619811E-01+I*(-9.84177367011036E-01):c := 5.94793489709051E-01+I*(-1.72769473918505E-01):d := -4.42558978408400E-01+I*(-4.51734322982393E-01):e := -5.30541875962104E-01+I*(5.26955230664780E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.91794211308852E-01+I*(4.68383539206043E-01):b := 1.23012298332245E-01+I*(-6.31254632440834E-01):c := 8.16155980921876E-01+I*(-3.75410052934824E-01):d := -4.09616633038404E-01+I*(-3.81499256935428E-01):e := -4.28509456257781E-01+I*(9.42725906943485E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.93317170247488E-01+I*(7.44182805526930E-01):b := -1.17943693923927E-01+I*(-3.72732806393921E-01):c := 1.11598434064183E+00+I*(-3.88352675839738E-01):d := -4.29527562644917E-01+I*(-3.06521143440208E-01):e := -3.70323221728879E-01+I*(1.53208836469937E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.05990290159276E-02+I*(8.92157479075498E-01):b := -4.68701319444482E-01+I*(-3.29577124427706E-01):c := 1.35398554713491E+00+I*(-2.05541345534806E-01):d := -4.92975221979719E-01+I*(-2.61883075090058E-01):e := -3.37422517530408E-01+I*(2.21983445581536E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.48110585454298E-01+I*(8.43068565543063E-01):b := -7.65137187011567E-01+I*(-5.21980609756160E-01):c := 1.41879619079421E+00+I*(8.74844848086703E-02):d := -5.70271746097867E-01+I*(-2.68471700162883E-01):e := -3.28227378576351E-01+I*(3.06980905576847E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.37721235902613E-01+I*(6.19885313133955E-01):b := -8.68545659672849E-01+I*(-8.59915533267549E-01):c := 1.28009065116149E+00+I*(3.53614772553628E-01):d := -6.25249232309303E-01+I*(-3.23204127762697E-01):e := -3.65055927799311E-01+I*(4.18637191237504E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.39511991696602E-01+I*(3.27037646055956E-01):b := -7.30540763812956E-01+I*(-1.18525838852257E+00):c := 1.00277079177126E+00+I*(4.68324198355509E-01):d := -6.32183103808999E-01+I*(-4.00470446732371E-01):e := -5.27433244395279E-01+I*(5.26581077238267E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.52644938298223E-01+I*(1.01552242374147E-01):b := -4.15696523958305E-01+I*(-1.34577763776431E+00):c := 7.16597656899124E-01+I*(3.77938947028352E-01):d := -5.87828925060847E-01+I*(-4.64116887706511E-01):e := -7.93333954457036E-01+I*(3.71974037804824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54427532114564E-02+I*(4.89362284623685E-02):b := -7.13320590408510E-02+I*(-1.26636454029984E+00):c := 5.55474836811889E-01+I*(1.24751282188309E-01):d := -5.12940509242897E-01+I*(-4.84362573601917E-01):e := -7.04452791587091E-01+I*(9.25472900794403E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54920322612816E-02+I*(2.56396238415360E-01):b := 1.75842898419666E-01+I*(-8.72372561887646E-01):c := 7.21783439825031E-01+I*(-9.86271799422975E-03):d := -2.36274852907649E-01+I*(-6.78866704323155E-01):e := -5.29782040454118E-01+I*(2.73363687100835E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.37334593333128E-01+I*(5.30970555629603E-01):b := 1.57434526132100E-01+I*(-5.19449827317444E-01):c := 9.43145931037857E-01+I*(-2.12503297010549E-01):d := -2.03332507537653E-01+I*(-6.08631638276190E-01):e := -4.04362157905256E-01+I*(2.34619870288854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.88575522717639E-02+I*(8.06769821950490E-01):b := -8.35214661240728E-02+I*(-2.60928001270531E-01):c := 1.24297429075781E+00+I*(-2.25445919915463E-01):d := -2.23243437144166E-01+I*(-5.33653524780970E-01):e := -3.16945805130403E-01+I*(2.52532235535783E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.13860588959797E-01+I*(9.54744495499058E-01):b := -4.34279091644628E-01+I*(-2.17772319304316E-01):c := 1.48097549725088E+00+I*(-4.26345896105315E-02):d := -2.86691096478968E-01+I*(-4.89015456430820E-01):e := -2.54671437617792E-01+I*(2.92575004585562E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.02570203430021E-01+I*(9.05655581966623E-01):b := -7.30714959211712E-01+I*(-4.10175804632770E-01):c := 1.54578614091019E+00+I*(2.50391240732944E-01):d := -3.63987620597116E-01+I*(-4.95604081503645E-01):e := -2.08693441993511E-01+I*(3.51409339897407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.92180853878336E-01+I*(6.82472329557516E-01):b := -8.34123431872994E-01+I*(-7.48110728144159E-01):c := 1.40708060127747E+00+I*(5.16521528477901E-01):d := -4.18965106808553E-01+I*(-5.50336509103459E-01):e := -1.82753171283332E-01+I*(4.39239469995457E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.93971609672326E-01+I*(3.89624662479517E-01):b := -6.96118536013102E-01+I*(-1.07345358339918E+00):c := 1.12976074188724E+00+I*(6.31230954279783E-01):d := -4.25898978308248E-01+I*(-6.27602828073134E-01):e := -2.14441186760714E-01+I*(5.72513272606985E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.07104556273948E-01+I*(1.64139258797708E-01):b := -3.81274296158451E-01+I*(-1.23397283264092E+00):c := 8.43587607015105E-01+I*(5.40845702952627E-01):d := -3.81544799560096E-01+I*(-6.91249269047274E-01):e := -4.17856707740404E-01+I*(6.78869289746886E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.19016864764269E-01+I*(1.11523244885929E-01):b := -3.69098312409963E-02+I*(-1.15455973517645E+00):c := 6.82464786927869E-01+I*(2.87658038112584E-01):d := -3.06656383742146E-01+I*(-7.11494954942680E-01):e := -6.26251907589930E-01+I*(4.71139235713365E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.99665502771513E-01+I*(1.40777184957658E-01):b := 1.30345111308786E-01+I*(-7.64598930681319E-01):c := 7.14348941200980E-01+I*(1.96558663617365E-01):d := 6.77458356203008E-02+I*(-7.20263322954720E-01):e := -5.06095324752442E-01+I*(5.96169132771834E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.78229416996670E-02+I*(4.15351502171901E-01):b := 1.11936739021220E-01+I*(-4.11676196111117E-01):c := 9.35711432413806E-01+I*(-6.08191539895485E-03):d := 1.00688180990297E-01+I*(-6.50028256907755E-01):e := -3.89787797995430E-01+I*(4.20040527728789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.96299982761031E-01+I*(6.91150768492787E-01):b := -1.29019253234952E-01+I*(-1.53154370064204E-01):c := 1.23553979213376E+00+I*(-1.90245383038688E-02):d := 8.07772513837838E-02+I*(-5.75050143412534E-01):e := -2.72775225105863E-01+I*(3.75391463098252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.49018123992592E-01+I*(8.39125442041356E-01):b := -4.79776878755507E-01+I*(-1.09998688097988E-01):c := 1.47354099862683E+00+I*(1.63786792001063E-01):d := 1.73295920489825E-02+I*(-5.30412075062384E-01):e := -1.81145058875503E-01+I*(3.78333162018648E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.37727738462817E-01+I*(7.90036528508920E-01):b := -7.76212746322592E-01+I*(-3.02402173426443E-01):c := 1.53835164228614E+00+I*(4.56812622344539E-01):d := -5.99669320691653E-02+I*(-5.37000700135210E-01):e := -1.03265268308639E-01+I*(4.06800146106483E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.27338388911132E-01+I*(5.66853276099813E-01):b := -8.79621218983874E-01+I*(-6.40337096937831E-01):c := 1.39964610265342E+00+I*(7.22942910089497E-01):d := -1.14944418280602E-01+I*(-5.91733127735024E-01):e := -3.11915246363781E-02+I*(4.63804435312826E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.29129144705122E-01+I*(2.74005609021814E-01):b := -7.41616323123981E-01+I*(-9.65679952192849E-01):c := 1.12232624326319E+00+I*(8.37652335891378E-01):d := -1.21878289780298E-01+I*(-6.68999446704698E-01):e := 2.95271823219049E-02+I*(5.74036731081298E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.42262091306743E-01+I*(4.85202053400054E-02):b := -4.26772083269331E-01+I*(-1.12619920143460E+00):c := 8.36153108391054E-01+I*(7.47267084564221E-01):d := -7.75241110321464E-02+I*(-7.32645887678838E-01):e := 3.42491630086395E-03+I*(7.84933642853387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54174399797063E-01+I*(-4.09580857177323E-03):b := -8.24076183518759E-02+I*(-1.04678610397012E+00):c := 6.75030288303818E-01+I*(4.94079419724179E-01):d := -2.63569521419609E-03+I*(-7.52891573574244E-01):e := -3.32163177025160E-01+I*(9.06216864943512E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.05488130734646E-01+I*(-9.89484983057995E-02):b := 2.62162295279331E-02+I*(-7.11284953203987E-01):c := 5.75968678368341E-01+I*(3.49907812342097E-01):d := 3.27248428199631E-01+I*(-5.56554240947210E-01):e := -3.51053386974532E-01+I*(1.32295862372343E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.03645569662799E-01+I*(1.75625818908444E-01):b := 7.80785724036716E-03+I*(-3.58362218633785E-01):c := 7.97331169581166E-01+I*(1.47267233325778E-01):d := 3.60190773569627E-01+I*(-4.86319174900244E-01):e := -4.14248169587431E-01+I*(7.65437896020849E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02122610724163E-01+I*(4.51425085229330E-01):b := -2.33148135015805E-01+I*(-9.98403925868716E-02):c := 1.09715952930112E+00+I*(1.34324610420863E-01):d := 3.40279843963113E-01+I*(-4.11341061405024E-01):e := -2.44076204610937E-01+I*(5.74399113580030E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.54840751955724E-01+I*(5.99399758777899E-01):b := -5.83905760536360E-01+I*(-5.66847106206561E-02):c := 1.33516073579419E+00+I*(3.17135940725795E-01):d := 2.76832184628312E-01+I*(-3.66702993054874E-01):e := -1.05463076518508E-01+I*(5.09654143293009E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.43550366425949E-01+I*(5.50310845245464E-01):b := -8.80341628103445E-01+I*(-2.49088195949111E-01):c := 1.39997137945350E+00+I*(6.10161771069271E-01):d := 1.99535660510164E-01+I*(-3.73291618127700E-01):e := 1.29444022222768E-02+I*(4.89684618937899E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.03316101687426E+00+I*(3.27127592836356E-01):b := -9.83750100764727E-01+I*(-5.87023119460499E-01):c := 1.26126583982078E+00+I*(8.76292058814229E-01):d := 1.44558174298727E-01+I*(-4.28024045727514E-01):e := 1.31466646911536E-01+I*(4.97855365237352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.03495177266825E+00+I*(3.42799257583570E-02):b := -8.45745204904834E-01+I*(-9.12365974715516E-01):c := 9.83945980430548E-01+I*(9.91001484616110E-01):d := 1.37624302799032E-01+I*(-5.05290364697188E-01):e := 2.71258222771618E-01+I*(5.46108952338147E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.48084719269875E-01+I*(-1.91205477923452E-01):b := -5.30900965050184E-01+I*(-1.07288522395726E+00):c := 6.97772845558415E-01+I*(9.00616233288954E-01):d := 1.81978481547184E-01+I*(-5.68936805671328E-01):e := 4.52336127449505E-01+I*(7.04192610261402E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.59997027760196E-01+I*(-2.43821491835231E-01):b := -1.86536500132729E-01+I*(-9.93472126492789E-01):c := 5.36650025471179E-01+I*(6.47428568448911E-01):d := 2.56866897365134E-01+I*(-5.89182491566734E-01):e := 4.92214843618943E-01+I*(1.22198251139599E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.32460267916660E-01+I*(-3.50610499921841E-01):b := -8.78206858740186E-02+I*(-7.37376832036153E-01):c := 3.71392314231817E-01+I*(3.78430957205717E-01):d := 4.20808777712409E-01+I*(-2.64340757195720E-01):e := 5.23928107944939E+00+I*(3.57149892943015E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.30617706844814E-01+I*(-7.60361827075976E-02):b := -1.06229058161585E-01+I*(-3.84454097465951E-01):c := 5.92754805444643E-01+I*(1.75790378189397E-01):d := 4.53751123082405E-01+I*(-1.94105691148755E-01):e := -1.10661976393253E+00+I*(1.89847497454982E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.29094747906178E-01+I*(1.99763083613288E-01):b := -3.47185050417757E-01+I*(-1.25932271419038E-01):c := 8.92583165164598E-01+I*(1.62847755284483E-01):d := 4.33840193475892E-01+I*(-1.19127577653534E-01):e := -3.71987697597827E-01+I*(1.03234174186457E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.81812889137739E-01+I*(3.47737757161857E-01):b := -6.97942675938312E-01+I*(-8.27765894528224E-02):c := 1.13058437165767E+00+I*(3.45659085589415E-01):d := 3.70392534141091E-01+I*(-7.44895093033844E-02):e := -4.46899607430245E-02+I*(7.88469458031467E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.70522503607964E-01+I*(2.98648843629422E-01):b := -9.94378543505396E-01+I*(-2.75180074781277E-01):c := 1.19539501531698E+00+I*(6.38684915932892E-01):d := 2.93096010022943E-01+I*(-8.10781343762096E-02):e := 1.71727728540426E-01+I*(6.57717131110754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.60133154056279E-01+I*(7.54655912203149E-02):b := -1.09778701616668E+00+I*(-6.13114998292665E-01):c := 1.05668947568426E+00+I*(9.04815203677848E-01):d := 2.38118523811506E-01+I*(-1.35810561976024E-01):e := 3.61515882653040E-01+I*(5.60077977715970E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.61923909850268E-01+I*(-2.17382075857685E-01):b := -9.59782120306786E-01+I*(-9.38457853547682E-01):c := 7.79369616294025E-01+I*(1.01952462947973E+00):d := 2.31184652311811E-01+I*(-2.13076880945698E-01):e := 5.74884846420314E-01+I*(4.67394442938897E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.75056856451889E-01+I*(-4.42867479539494E-01):b := -6.44937880452135E-01+I*(-1.09897710278943E+00):c := 4.93196481421891E-01+I*(9.29139378152574E-01):d := 2.75538831059962E-01+I*(-2.76723321919838E-01):e := 8.93136074187224E-01+I*(3.59643804033814E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.86969164942210E-01+I*(-4.95483493451272E-01):b := -3.00573415534681E-01+I*(-1.01956400532496E+00):c := 3.32073661334655E-01+I*(6.75951713312531E-01):d := 3.50427246877913E-01+I*(-2.96969007815244E-01):e := 1.62911560529123E+00+I*(2.35098671247150E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.47524629443814E-02+I*(-4.96453372422719E-01):b := -1.58406494801354E-01+I*(-8.30665887093314E-01):c := 1.96343403183920E-01+I*(2.68781801727091E-01):d := 3.04648956814146E-01+I*(1.96471916613028E-02):e := -6.67341107780945E-02+I*(-1.69724673464044E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.70900981274647E-02+I*(-2.21879055208476E-01):b := -1.76814867088920E-01+I*(-4.77743152523112E-01):c := 4.17705894396746E-01+I*(6.61412227107716E-02):d := 3.37591302184142E-01+I*(8.98822577082680E-02):e := -1.68534717963009E+00+I*(-1.25077728410644E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13869429338992E-02+I*(5.39202111124102E-02):b := -4.17770859345092E-01+I*(-2.19221326476199E-01):c := 7.17534254116701E-01+I*(5.31985998058576E-02):d := 3.17680372577629E-01+I*(1.64860371203489E-01):e := -1.87745175365640E+00+I*(7.31861468223925E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.64105084165460E-01+I*(2.01894884660979E-01):b := -7.68528484865647E-01+I*(-1.76065644509984E-01):c := 9.55535460609774E-01+I*(2.36009930110789E-01):d := 2.54232713242827E-01+I*(2.09498439553639E-01):e := -5.69342205688773E-01+I*(1.48497834637267E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.52814698635685E-01+I*(1.52805971128544E-01):b := -1.06496435243273E+00+I*(-3.68469129838439E-01):c := 1.02034610426908E+00+I*(5.29035760454266E-01):d := 1.76936189124679E-01+I*(2.02909814480813E-01):e := 3.60939850003048E-01+I*(1.23447169331212E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.42425349084000E-01+I*(-7.03772812805635E-02):b := -1.16837282509401E+00+I*(-7.06404053349827E-01):c := 8.81640564636362E-01+I*(7.95166048199223E-01):d := 1.21958702913242E-01+I*(1.48177386880999E-01):e := 8.50749891021533E-01+I*(7.51714917417375E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.44216104877989E-01+I*(-3.63224948358563E-01):b := -1.03036792923412E+00+I*(-1.03174690860484E+00):c := 6.04320705246127E-01+I*(9.09875474001105E-01):d := 1.15024831413547E-01+I*(7.09110679113251E-02):e := 1.07781785267138E+00+I*(2.10212129735355E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.57349051479611E-01+I*(-5.88710352040372E-01):b := -7.15523689379471E-01+I*(-1.19226615784659E+00):c := 3.18147570373994E-01+I*(8.19490222673948E-01):d := 1.59379010161699E-01+I*(7.26462693718497E-03):e := 1.09502900511524E+00+I*(-3.90917462482222E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69261359969932E-01+I*(-6.41326365952150E-01):b := -3.71159224462016E-01+I*(-1.11285306038212E+00):c := 1.57024750286758E-01+I*(5.66302557833905E-01):d := 2.34267425979649E-01+I*(-1.29810589582211E-02):e := 8.15665276234363E-01+I*(-1.07513771683695E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.45767382682921E-01+I*(-4.68235614902293E-01):b := -1.52513312783088E-01+I*(-9.47501132721866E-01):c := 1.32729276155903E-01+I*(7.22664043692918E-02):d := 3.31214366757467E-02+I*(1.62528488179170E-01):e := -4.27096518361662E-01+I*(-7.47788571027099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.47609943754767E-01+I*(-1.93661297688049E-01):b := -1.70921685070654E-01+I*(-5.94578398151664E-01):c := 3.54091767368729E-01+I*(-1.30374174647028E-01):d := 6.60637820457429E-02+I*(2.32763554226136E-01):e := -6.82466362935258E-01+I*(-5.13655557928877E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.49132902693403E-01+I*(8.21379686328367E-02):b := -4.11877677326827E-01+I*(-3.36056572104751E-01):c := 6.53920127088684E-01+I*(-1.43316797551942E-01):d := 4.61528524392296E-02+I*(3.07741667721356E-01):e := -9.32996935585974E-01+I*(-2.20414315524111E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.58523853815787E-03+I*(2.30112642181405E-01):b := -7.62635302847382E-01+I*(-2.92900890138535E-01):c := 8.91921333581758E-01+I*(3.94945327529899E-02):d := -1.72948068955718E-02+I*(3.52379736071506E-01):e := -1.22887783369967E+00+I*(2.63889064662719E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.92294853008383E-01+I*(1.81023728648971E-01):b := -1.05907117041447E+00+I*(-4.85304375466990E-01):c := 9.56731977241065E-01+I*(3.32520363096466E-01):d := -9.45913310137197E-02+I*(3.45791110998681E-01):e := -1.53230801743705E+00+I*(1.49390290327992E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.81905503456698E-01+I*(-4.21595237601369E-02):b := -1.16247964307575E+00+I*(-8.23239298978378E-01):c := 8.18026437608346E-01+I*(5.98650650841423E-01):d := -1.49568817225157E-01+I*(2.91058683398866E-01):e := 2.81330263360416E+00+I*(4.27830691071405E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.83696259250687E-01+I*(-3.35007190838136E-01):b := -1.02447474721586E+00+I*(-1.14858215423340E+00):c := 5.40706578218111E-01+I*(7.13360076643305E-01):d := -1.56502688724852E-01+I*(2.13792364429193E-01):e := 1.93010863893105E+00+I*(-1.39086408914768E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.96829205852309E-01+I*(-5.60492594519945E-01):b := -7.09630507361205E-01+I*(-1.30910140347514E+00):c := 2.54533443345977E-01+I*(6.22974825316149E-01):d := -1.12148509976700E-01+I*(1.50145923455053E-01):e := 4.51908748711944E-01+I*(-1.24609820200332E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.74151434262933E-03+I*(-6.13108608431724E-01):b := -3.65266042443750E-01+I*(-1.22968830601067E+00):c := 9.34106232587411E-02+I*(3.69787160476106E-01):d := -3.72600941587501E-02+I*(1.29900237559647E-01):e := -1.01672150415180E-01+I*(-9.79148027727189E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.10274385714869E-01+I*(-2.24831144580932E-01):b := 1.46895335627542E-01+I*(-1.17403371070135E+00):c := 2.02408342880611E-01+I*(3.45542080418345E-01):d := -2.27734978277919E-01+I*(-1.29859387482453E-01):e := -6.65035921208836E-01+I*(-3.25556937930040E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.12116946786715E-01+I*(4.97431726333110E-02):b := 1.28486963339976E-01+I*(-8.21110976131144E-01):c := 4.23770834093436E-01+I*(1.42901501402025E-01):d := -1.94792632907922E-01+I*(-5.96243214354879E-02):e := -5.29595467676026E-01+I*(6.57566013861860E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.13639905725351E-01+I*(3.25542438954197E-01):b := -1.12469028916197E-01+I*(-5.62589150084231E-01):c := 7.23599193813391E-01+I*(1.29958878497111E-01):d := -2.14703562514436E-01+I*(1.53537920597326E-02):e := -4.56942435841167E-01+I*(1.63775794029596E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.60921764493790E-01+I*(4.73517112502766E-01):b := -4.63226654436752E-01+I*(-5.19433468118016E-01):c := 9.61600400306465E-01+I*(3.12770208802043E-01):d := -2.78151221849237E-01+I*(5.99918604098827E-02):e := -4.13995464783394E-01+I*(2.68031943767909E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.27787849976434E-01+I*(4.24428198970331E-01):b := -7.59662522003837E-01+I*(-7.11836953446471E-01):c := 1.02641104396577E+00+I*(6.05796039145519E-01):d := -3.55447745967385E-01+I*(5.34032353370574E-02):e := -3.96474781610742E-01+I*(3.97216736109509E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.17398500424750E-01+I*(2.01244946561223E-01):b := -8.63070994665118E-01+I*(-1.04977187695786E+00):c := 8.87705504333053E-01+I*(8.71926326890476E-01):d := -4.10425232178822E-01+I*(-1.32919226275705E-03):e := -4.36110556697575E-01+I*(5.86249518808209E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.19189256218739E-01+I*(-9.16027205167758E-02):b := -7.25066098805226E-01+I*(-1.37511473221288E+00):c := 6.10385644942818E-01+I*(9.86635752692358E-01):d := -4.17359103678518E-01+I*(-7.85955112324307E-02):e := -7.15506570651536E-01+I*(8.45586315127997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32322202820360E-01+I*(-3.17088124198585E-01):b := -4.10221858950575E-01+I*(-1.53563398145462E+00):c := 3.24212510070684E-01+I*(8.96250501365202E-01):d := -3.73004924930366E-01+I*(-1.42241952206571E-01):e := -1.34529727621067E+00+I*(4.55218888734481E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55765488689319E-01+I*(-3.69704138110363E-01):b := -6.58573940331201E-02+I*(-1.45622088399015E+00):c := 1.63089689983448E-01+I*(6.43062836525158E-01):d := -2.98116509112415E-01+I*(-1.62487638101977E-01):e := -9.66533276658102E-01+I*(-7.09009398280681E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.27724115775385E-01+I*(3.66307813776479E-02):b := 2.62978931665756E-01+I*(-1.18851828685051E+00):c := 3.84891752552559E-01+I*(2.48769854285376E-01):d := -4.15595845907604E-01+I*(-3.72450717707911E-01):e := -4.78794833033438E-01+I*(9.48191609029445E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.29566676847231E-01+I*(3.11205098591891E-01):b := 2.44570559378190E-01+I*(-8.35595552280311E-01):c := 6.06254243765384E-01+I*(4.61292752690566E-02):d := -3.82653500537608E-01+I*(-3.02215651660946E-01):e := -3.87982388410243E-01+I*(1.15012526556169E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.31089635785867E-01+I*(5.87004364912777E-01):b := 3.61456712201744E-03+I*(-5.77073726233397E-01):c := 9.06082603485339E-01+I*(3.31866523641424E-02):d := -4.02564430144121E-01+I*(-2.27237538165725E-01):e := -3.32817211130053E-01+I*(1.58530142404878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.78371494554306E-01+I*(7.34979038461346E-01):b := -3.47143058398537E-01+I*(-5.33918044267182E-01):c := 1.14408380997841E+00+I*(2.15997982669075E-01):d := -4.66012089478922E-01+I*(-1.82599469815576E-01):e := -3.00208487504406E-01+I*(2.13564755850535E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10338119915919E-01+I*(6.85890124928911E-01):b := -6.43578925965622E-01+I*(-7.26321529595637E-01):c := 1.20889445363772E+00+I*(5.09023813012551E-01):d := -5.43308613597070E-01+I*(-1.89188094888401E-01):e := -2.88530912542541E-01+I*(2.82677240710894E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.99948770364234E-01+I*(4.62706872519803E-01):b := -7.46987398626904E-01+I*(-1.06425645310703E+00):c := 1.07018891400500E+00+I*(7.75154100757508E-01):d := -5.98286099808507E-01+I*(-2.43920522488215E-01):e := -3.14112647555689E-01+I*(3.71650030399062E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.01739526158223E-01+I*(1.69859205441804E-01):b := -6.08982502767011E-01+I*(-1.38959930836204E+00):c := 7.92869054614766E-01+I*(8.89863526559389E-01):d := -6.05219971308202E-01+I*(-3.21186841457889E-01):e := -4.30029341784560E-01+I*(4.56702573639578E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.14872472759845E-01+I*(-5.56261982400048E-02):b := -2.94138262912361E-01+I*(-1.55011855760379E+00):c := 5.06695919742632E-01+I*(7.99478275232233E-01):d := -5.60865792560051E-01+I*(-3.84833282432029E-01):e := -6.29063078552835E-01+I*(3.72703179953385E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.73215218749835E-01+I*(-1.08242212151783E-01):b := 5.02262020050938E-02+I*(-1.47070546013931E+00):c := 3.45573099655397E-01+I*(5.46290610392190E-01):d := -4.85977376742100E-01+I*(-4.05078968327435E-01):e := -6.09515642550032E-01+I*(1.56839263171883E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73026898111215E-01+I*(2.48138707120679E-01):b := 3.61214631428344E-01+I*(-1.12499701869929E+00):c := 5.86886142413215E-01+I*(2.91936102918443E-01):d := -4.03570918348535E-01+I*(-6.79041096233289E-01):e := -3.75894104622552E-01+I*(1.94791537167623E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.74869459183061E-01+I*(5.22713024334922E-01):b := 3.42806259140778E-01+I*(-7.72074284129091E-01):c := 8.08248633626040E-01+I*(8.92955239021237E-02):d := -3.70628572978539E-01+I*(-6.08806030186324E-01):e := -3.08228207995849E-01+I*(1.74536447614594E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.76392418121698E-01+I*(7.98512290655808E-01):b := 1.01850266884605E-01+I*(-5.13552458082178E-01):c := 1.10807699334600E+00+I*(7.63529009972095E-02):d := -3.90539502585052E-01+I*(-5.33827916691103E-01):e := -2.56840097105094E-01+I*(1.87869306116728E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.36742768901363E-02+I*(9.46486964204376E-01):b := -2.48907358635950E-01+I*(-4.70396776115963E-01):c := 1.34607819983907E+00+I*(2.59164231302142E-01):d := -4.53987161919853E-01+I*(-4.89189848340953E-01):e := -2.20999542501154E-01+I*(2.17445851092910E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65035337580088E-01+I*(8.97398050671941E-01):b := -5.45343226203035E-01+I*(-6.62800261444417E-01):c := 1.41088884349838E+00+I*(5.52190061645617E-01):d := -5.31283686038001E-01+I*(-4.95778473413778E-01):e := -1.99404809693224E-01+I*(2.60164712535663E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54645988028403E-01+I*(6.74214798262834E-01):b := -6.48751698864317E-01+I*(-1.00073518495581E+00):c := 1.27218330386566E+00+I*(8.18320349390575E-01):d := -5.86261172249439E-01+I*(-5.50510901013593E-01):e := -1.99171990200802E-01+I*(3.18109607888967E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56436743822392E-01+I*(3.81367131184835E-01):b := -5.10746803004424E-01+I*(-1.32607804021082E+00):c := 9.94863444475421E-01+I*(9.33029775192456E-01):d := -5.93195043749134E-01+I*(-6.27777219983266E-01):e := -2.45211497089961E-01+I*(3.84237750917757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69569690424014E-01+I*(1.55881727503026E-01):b := -1.95902563149773E-01+I*(-1.48659728945257E+00):c := 7.08690309603288E-01+I*(8.42644523865299E-01):d := -5.48840865000982E-01+I*(-6.91423660957407E-01):e := -3.59258487093621E-01+I*(3.93889923530803E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.85180010856653E-02+I*(1.03265713591248E-01):b := 1.48461901767681E-01+I*(-1.40718419198809E+00):c := 5.47567489516053E-01+I*(5.89456859025257E-01):d := -4.73952449183032E-01+I*(-7.11669346852813E-01):e := -4.25586604158924E-01+I*(2.83881888997492E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.85672801354895E-02+I*(3.10725723544239E-01):b := 3.95636859228198E-01+I*(-1.01319221357590E+00):c := 7.13876092529195E-01+I*(4.54842858842719E-01):d := -1.97286792847782E-01+I*(-9.06173477574051E-01):e := -2.99166741322068E-01+I*(2.90334344394761E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20409841207336E-01+I*(5.85300040758482E-01):b := 3.77228486940632E-01+I*(-6.60269479005701E-01):c := 9.35238583742020E-01+I*(2.52202279826399E-01):d := -1.64344447477786E-01+I*(-8.35938411527086E-01):e := -2.52834006876001E-01+I*(2.39957187822016E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.19328001459716E-02+I*(8.61099307079368E-01):b := 1.36272494684459E-01+I*(-4.01747652958788E-01):c := 1.23506694346198E+00+I*(2.39259656921485E-01):d := -1.84255377084299E-01+I*(-7.60960298031865E-01):e := -2.03498249668386E-01+I*(2.29724580936590E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.30785341085589E-01+I*(1.00907398062794E+00):b := -2.14485130836096E-01+I*(-3.58591970992572E-01):c := 1.47306814995505E+00+I*(4.22070987226417E-01):d := -2.47703036419101E-01+I*(-7.16322229681716E-01):e := -1.63013802047720E-01+I*(2.41209027079785E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.19494955555814E-01+I*(9.59985067095502E-01):b := -5.10920998403180E-01+I*(-5.50995456321027E-01):c := 1.53787879361436E+00+I*(7.15096817569893E-01):d := -3.24999560537248E-01+I*(-7.22910854754541E-01):e := -1.31897772950554E-01+I*(2.67805772244787E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.09105606004130E-01+I*(7.36801814686394E-01):b := -6.14329471064462E-01+I*(-8.88930379832415E-01):c := 1.39917325398164E+00+I*(9.81227105314851E-01):d := -3.79977046748685E-01+I*(-7.77643282354355E-01):e := -1.13395908354562E-01+I*(3.10433007050466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.10896361798118E-01+I*(4.43954147608395E-01):b := -4.76324575204570E-01+I*(-1.21427323508743E+00):c := 1.12185339459140E+00+I*(1.09593653111673E+00):d := -3.86910918248381E-01+I*(-8.54909601324029E-01):e := -1.22490816945944E-01+I*(3.70490297453604E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.24029308399740E-01+I*(2.18468743926586E-01):b := -1.61480335349919E-01+I*(-1.37479248432918E+00):c := 8.35680259719268E-01+I*(1.00555127978958E+00):d := -3.42556739500229E-01+I*(-9.18556042298169E-01):e := -1.90260945258616E-01+I*(4.21895809351323E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.35941616890060E-01+I*(1.65852730014807E-01):b := 1.82884129567536E-01+I*(-1.29537938686470E+00):c := 6.74557439632033E-01+I*(7.52363614949532E-01):d := -2.67668323682279E-01+I*(-9.38801728193575E-01):e := -2.87619016822557E-01+I*(3.83796629453820E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.16590254897305E-01+I*(1.95106670086536E-01):b := 3.50139072117318E-01+I*(-9.05418582369576E-01):c := 7.06441593905144E-01+I*(6.61264240454313E-01):d := 1.06733895680167E-01+I*(-9.47570096205616E-01):e := -2.28066302138599E-01+I*(4.04346146077923E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.14747693825459E-01+I*(4.69680987300780E-01):b := 3.31730699829753E-01+I*(-5.52495847799373E-01):c := 9.27804085117969E-01+I*(4.58623661437994E-01):d := 1.39676241050163E-01+I*(-8.77335030158650E-01):e := -2.09576328579782E-01+I*(3.22337509007759E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.13224734886823E-01+I*(7.45480253621665E-01):b := 9.07747075735800E-02+I*(-2.93974021752461E-01):c := 1.22763244483792E+00+I*(4.45681038533080E-01):d := 1.19765311443650E-01+I*(-8.02356916663430E-01):e := -1.62116478792150E-01+I*(2.86314067214135E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.65942876118384E-01+I*(8.93454927170234E-01):b := -2.59982917946975E-01+I*(-2.50818339786245E-01):c := 1.46563365133100E+00+I*(6.28492368838011E-01):d := 5.63176521088484E-02+I*(-7.57718848313280E-01):e := -1.15611671227955E-01+I*(2.79950857716814E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.54652490588609E-01+I*(8.44366013637799E-01):b := -5.56418785514059E-01+I*(-4.43221825114700E-01):c := 1.53044429499031E+00+I*(9.21518199181488E-01):d := -2.09788720092994E-02+I*(-7.64307473386106E-01):e := -7.44261916502912E-02+I*(2.92514612604452E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.44263141036924E-01+I*(6.21182761228691E-01):b := -6.59827258175341E-01+I*(-7.81156748626089E-01):c := 1.39173875535759E+00+I*(1.18764848692644E+00):d := -7.59563582207363E-02+I*(-8.19039900985920E-01):e := -3.97740925265334E-02+I*(3.23216064564015E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.46053896830912E-01+I*(3.28335094150693E-01):b := -5.21822362315449E-01+I*(-1.10649960388110E+00):c := 1.11441889596735E+00+I*(1.30235791272833E+00):d := -8.28902297204320E-02+I*(-8.96306219955594E-01):e := -2.02380928936781E-02+I*(3.77871716446675E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.59186843432534E-01+I*(1.02849690468884E-01):b := -2.06978122460798E-01+I*(-1.26701885312285E+00):c := 8.28245761095217E-01+I*(1.21197266140117E+00):d := -3.85360509722801E-02+I*(-9.59952660929733E-01):e := -4.70731273972712E-02+I*(4.54824541558785E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.71099151922855E-01+I*(5.02336765571053E-02):b := 1.37386342456657E-01+I*(-1.18760575565838E+00):c := 6.67122941007982E-01+I*(9.58784996561126E-01):d := 3.63523648456704E-02+I*(-9.80198346825140E-01):e := -1.52244087509932E-01+I*(4.85863333924842E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.22412882860437E-01+I*(-4.46190131769208E-02):b := 2.46010190336465E-01+I*(-8.52104604892244E-01):c := 5.68061331072504E-01+I*(8.14613389179045E-01):d := 3.66236488259497E-01+I*(-7.83861014198105E-01):e := -1.51536090687828E-01+I*(5.82658091143868E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.20570321788591E-01+I*(2.29955304037323E-01):b := 2.27601818048899E-01+I*(-4.99181870322041E-01):c := 7.89423822285330E-01+I*(6.11972810162726E-01):d := 3.99178833629493E-01+I*(-7.13625948151140E-01):e := -1.82534572803191E-01+I*(4.48812119064332E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.19047362849955E-01+I*(5.05754570358208E-01):b := -1.33541742072731E-02+I*(-2.40660044275129E-01):c := 1.08925218200528E+00+I*(5.99030187257811E-01):d := 3.79267904022979E-01+I*(-6.38647834655919E-01):e := -1.34363414949176E-01+I*(3.72383838852072E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.71765504081516E-01+I*(6.53729243906777E-01):b := -3.64111799727828E-01+I*(-1.97504362308913E-01):c := 1.32725338849836E+00+I*(7.81841517562744E-01):d := 3.15820244688178E-01+I*(-5.94009766305770E-01):e := -7.62751154714234E-02+I*(3.42339496669875E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.60475118551741E-01+I*(6.04640330374342E-01):b := -6.60547667294912E-01+I*(-3.89907847637368E-01):c := 1.39206403215767E+00+I*(1.07486734790622E+00):d := 2.38523720570030E-01+I*(-6.00598391378595E-01):e := -2.03470783877785E-02+I*(3.38672654499250E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05008576900006E+00+I*(3.81457077965235E-01):b := -7.63956139956194E-01+I*(-7.27842771148756E-01):c := 1.25335849252495E+00+I*(1.34099763565118E+00):d := 1.83546234358593E-01+I*(-6.55330818978409E-01):e := 3.40195324504968E-02+I*(3.56587989925428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05187652479404E+00+I*(8.86094108872357E-02):b := -6.25951244096302E-01+I*(-1.05318562640377E+00):c := 9.76038633134712E-01+I*(1.45570706145306E+00):d := 1.76612362858898E-01+I*(-7.32597137948083E-01):e := 8.50345462068990E-02+I*(4.04018470176475E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.65009471395666E-01+I*(-1.36875992794573E-01):b := -3.11107004241651E-01+I*(-1.21370487564552E+00):c := 6.89865498262578E-01+I*(1.36532181012590E+00):d := 2.20966541607050E-01+I*(-7.96243578922223E-01):e := 1.09002061003712E-01+I*(5.00750671534707E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.76921779885987E-01+I*(-1.89492006706352E-01):b := 3.32574606758032E-02+I*(-1.13429177818105E+00):c := 5.28742678175342E-01+I*(1.11213414528586E+00):d := 2.95854957425000E-01+I*(-8.16489264817629E-01):e := 2.05053080966035E-02+I*(6.22189894682426E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.49385020042451E-01+I*(-2.96281014792962E-01):b := 1.31973274934514E-01+I*(-8.78196483724410E-01):c := 3.63484966935981E-01+I*(8.43136534042665E-01):d := 4.59796837772275E-01+I*(-4.91647530446615E-01):e := -1.01342674477038E-01+I*(9.99612152504192E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.47542458970605E-01+I*(-2.17066975787189E-02):b := 1.13564902646948E-01+I*(-5.25273749154208E-01):c := 5.84847458148807E-01+I*(6.40495955026345E-01):d := 4.92739183142271E-01+I*(-4.21412464399650E-01):e := -2.43666002367944E-01+I*(6.85918016835482E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.46019500031969E-01+I*(2.54092568742167E-01):b := -1.27391089609225E-01+I*(-2.66751923107295E-01):c := 8.84675817868762E-01+I*(6.27553332121431E-01):d := 4.72828253535758E-01+I*(-3.46434350904430E-01):e := -1.59450293938845E-01+I*(5.19667070243629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.98737641263530E-01+I*(4.02067242290736E-01):b := -4.78148715129780E-01+I*(-2.23596241141079E-01):c := 1.12267702436184E+00+I*(8.10364662426363E-01):d := 4.09380594200957E-01+I*(-3.01796282554280E-01):e := -6.32381845206040E-02+I*(4.52936991993966E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.87447255733755E-01+I*(3.52978328758301E-01):b := -7.74584582696864E-01+I*(-4.15999726469534E-01):c := 1.18748766802114E+00+I*(1.10339049276984E+00):d := 3.32084070082809E-01+I*(-3.08384907627105E-01):e := 2.59823303655156E-02+I*(4.28577432634215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.77057906182070E-01+I*(1.29795076349194E-01):b := -8.77993055358146E-01+I*(-7.53934649980922E-01):c := 1.04878212838842E+00+I*(1.36952078051480E+00):d := 2.77106583871371E-01+I*(-3.63117335226920E-01):e := 1.16267813197730E-01+I*(4.31244484849872E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.78848661976059E-01+I*(-1.63052590728806E-01):b := -7.39988159498253E-01+I*(-1.07927750523594E+00):c := 7.71462268998188E-01+I*(1.48423020631668E+00):d := 2.70172712371676E-01+I*(-4.40383654196593E-01):e := 2.18379764386268E-01+I*(4.68779985594993E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.91981608577681E-01+I*(-3.88537994410615E-01):b := -4.25143919643603E-01+I*(-1.23979675447769E+00):c := 4.85289134126054E-01+I*(1.39384495498952E+00):d := 3.14526891119828E-01+I*(-5.04030095170733E-01):e := 3.33170590722990E-01+I*(5.86254662710876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.03893917068001E-01+I*(-4.41154008322393E-01):b := -8.07794547261486E-02+I*(-1.16038365701321E+00):c := 3.24166314038819E-01+I*(1.14065729014948E+00):d := 3.89415306937778E-01+I*(-5.24275781066139E-01):e := 3.32740608129866E-01+I*(8.87193495079025E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.16772150701728E-02+I*(-4.42123887293840E-01):b := 6.13874660071785E-02+I*(-9.71485538781571E-01):c := 1.88436055888084E-01+I*(7.33487378564039E-01):d := 3.43637016874011E-01+I*(-2.07659581589593E-01):e := -1.56240855623230E+00+I*(1.92721643222178E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.01653460016733E-02+I*(-1.67549570079597E-01):b := 4.29790937196125E-02+I*(-6.18562804211369E-01):c := 4.09798547100909E-01+I*(5.30846799547720E-01):d := 3.76579362244008E-01+I*(-1.37424515542627E-01):e := -8.09797810032215E-01+I*(8.15224694211458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.83116950596908E-02+I*(1.08249696241289E-01):b := -1.97976898536560E-01+I*(-3.60040978164456E-01):c := 7.09626906820864E-01+I*(5.17904176642806E-01):d := 3.56668432637494E-01+I*(-6.24464020474070E-02):e := -4.19980492412328E-01+I*(6.55424545992016E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.81029836291252E-01+I*(2.56224369789857E-01):b := -5.48734524057115E-01+I*(-3.16885296198241E-01):c := 9.47628113313937E-01+I*(7.00715506947737E-01):d := 2.93220773302693E-01+I*(-1.78083336972569E-02):e := -1.88086601125833E-01+I*(6.14227763465722E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.69739450761476E-01+I*(2.07135456257423E-01):b := -8.45170391624199E-01+I*(-5.09288781526695E-01):c := 1.01243875697325E+00+I*(9.93741337291213E-01):d := 2.15924249184545E-01+I*(-2.43969587700821E-02):e := -4.60614988001820E-03+I*(6.06891677931950E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.59350101209792E-01+I*(-1.60477961516850E-02):b := -9.48578864285482E-01+I*(-8.47223705038084E-01):c := 8.73733217340526E-01+I*(1.25987162503617E+00):d := 1.60946762973108E-01+I*(-7.91293863698965E-02):e := 1.79772510422484E-01+I*(6.21577469984659E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.61140857003780E-01+I*(-3.08895463229684E-01):b := -8.10573968425589E-01+I*(-1.17256656029310E+00):c := 5.96413357950291E-01+I*(1.37458105083805E+00):d := 1.54012891473413E-01+I*(-1.56395705339570E-01):e := 4.15258529839299E-01+I*(6.73645637666552E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.74273803605402E-01+I*(-5.34380866911493E-01):b := -4.95729728570938E-01+I*(-1.33308580953485E+00):c := 3.10240223078156E-01+I*(1.28419579951090E+00):d := 1.98367070221564E-01+I*(-2.20042146313710E-01):e := 8.15454296751683E-01+I*(8.61810715504322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.86186112095723E-01+I*(-5.86996880823272E-01):b := -1.51365263653484E-01+I*(-1.25367271207037E+00):c := 1.49117402990922E-01+I*(1.03100813467085E+00):d := 2.73255486039515E-01+I*(-2.40287832209117E-01):e := 1.50904083600555E+00+I*(2.16140479533444E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.28842630557129E-01+I*(-4.13906129773414E-01):b := 6.72806480254440E-02+I*(-1.08832078441012E+00):c := 1.24821928860067E-01+I*(5.36971981206240E-01):d := 7.21094967356126E-02+I*(-6.47782850717252E-02):e := -1.21832454737262E+00+I*(-1.61563960981958E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.30685191628975E-01+I*(-1.39331812559171E-01):b := 4.88722757378782E-02+I*(-7.35398049839920E-01):c := 3.46184420072893E-01+I*(3.34331402189920E-01):d := 1.05051842105609E-01+I*(5.45678097523996E-03):e := -8.33681574157952E-01+I*(1.41098127599207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.32208150567611E-01+I*(1.36467453761716E-01):b := -1.92083716518294E-01+I*(-4.76876223793008E-01):c := 6.46012779792848E-01+I*(3.21388779285006E-01):d := 8.51409124990954E-02+I*(8.04348944704604E-02):e := -6.26116292957193E-01+I*(3.32469705644898E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.05099906639494E-02+I*(2.84442127310284E-01):b := -5.42841342038849E-01+I*(-4.33720541826792E-01):c := 8.84013986285921E-01+I*(5.04200109589938E-01):d := 2.16932531642941E-02+I*(1.25072962820610E-01):e := -4.67203872667506E-01+I*(4.94923452969769E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.09219605134174E-01+I*(2.35353213777849E-01):b := -8.39277209605933E-01+I*(-6.26124027155247E-01):c := 9.48824629945229E-01+I*(7.97225939933414E-01):d := -5.56032709538536E-02+I*(1.18484337747785E-01):e := -3.09491892341318E-01+I*(6.72093345556615E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.98830255582489E-01+I*(1.21699613687417E-02):b := -9.42685682267215E-01+I*(-9.64058950666635E-01):c := 8.10119090312510E-01+I*(1.06335622767837E+00):d := -1.10580757165291E-01+I*(6.37519101479706E-02):e := -1.07443118428123E-01+I*(9.26902572756711E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00621011376478E-01+I*(-2.80677705709257E-01):b := -8.04680786407323E-01+I*(-1.28940180592165E+00):c := 5.32799230922274E-01+I*(1.17806565348025E+00):d := -1.17514628664986E-01+I*(-1.35144088217030E-02):e := 2.49571549562914E-01+I*(1.48324309623796E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13753957978100E-01+I*(-5.06163109391066E-01):b := -4.89836546552673E-01+I*(-1.44992105516340E+00):c := 2.46626096050141E-01+I*(1.08768040215310E+00):d := -7.31604499168344E-02+I*(-7.71608497958430E-02):e := 7.04467129301014E-01+I*(5.10700626687527E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.56662664684208E-02+I*(-5.58779123302845E-01):b := -1.45472081635218E-01+I*(-1.37050795769892E+00):c := 8.55032759629051E-02+I*(8.34492737313053E-01):d := 1.72796590111594E-03+I*(-9.74065356912490E-02):e := -2.69517397860738E+00+I*(-8.75497466695140E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.49043455632946E-01+I*(-4.75174282592324E-01):b := 8.12497939916392E-01+I*(-1.12595012373560E+00):c := -5.14218207006672E-01+I*(6.75969715252312E-01):d := 6.75416992134221E-02+I*(-4.36567945687029E-02):e := -8.17318001694279E-01+I*(6.24219788404468E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.50886016704792E-01+I*(-2.00599965378081E-01):b := 7.94089567628827E-01+I*(-7.73027389165402E-01):c := -2.92855715793847E-01+I*(4.73329136235992E-01):d := 1.00484044583418E-01+I*(2.65782714782624E-02):e := -5.43790466133637E-01+I*(4.29614877110092E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.52408975643428E-01+I*(7.51993009428054E-02):b := 5.53133575372654E-01+I*(-5.14505563118489E-01):c := 6.97264392610836E-03+I*(4.60386513331078E-01):d := 8.05731149769049E-02+I*(1.01556384973483E-01):e := -3.65606512604382E-01+I*(4.09860731258375E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.96908344118668E-02+I*(2.23173974491374E-01):b := 2.02375949852099E-01+I*(-4.71349881152273E-01):c := 2.44973850419182E-01+I*(6.43197843636010E-01):d := 1.71254556421036E-02+I*(1.46194453323633E-01):e := -2.39646424830895E-01+I*(4.34084411423099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.89018780058358E-01+I*(1.74085060958939E-01):b := -9.40599177149856E-02+I*(-6.63753366480728E-01):c := 3.09784494078490E-01+I*(9.36223673979486E-01):d := -6.01710684760444E-02+I*(1.39605828250807E-01):e := -1.33290752444246E-01+I*(4.82749157335854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78629430506673E-01+I*(-4.90981914501684E-02):b := -1.97468390376267E-01+I*(-1.00168828999212E+00):c := 1.71078954445770E-01+I*(1.20235396172444E+00):d := -1.15148554687481E-01+I*(8.48734006509929E-02):e := -2.87777842471637E-02+I*(5.66166138314386E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.80420186300662E-01+I*(-3.41945858528168E-01):b := -5.94634945163748E-02+I*(-1.32703114524713E+00):c := -1.06240904944465E-01+I*(1.31706338752632E+00):d := -1.22082426187177E-01+I*(7.60708168131921E-03):e := 7.78951256199244E-02+I*(7.30910129899004E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.93553132902284E-01+I*(-5.67431262209977E-01):b := 2.55380745338276E-01+I*(-1.48755039448888E+00):c := -3.92414039816599E-01+I*(1.22667813619917E+00):d := -7.77282474390250E-02+I*(-5.60393592928208E-02):e := 7.59695360369452E-02+I*(1.11931162976725E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.45345586073954E-02+I*(-6.20047276121755E-01):b := 5.99745210255730E-01+I*(-1.40813729702441E+00):c := -5.53536859903834E-01+I*(9.73490471359126E-01):d := -2.83983162107457E-03+I*(-7.62850451882268E-02):e := -6.90595706952801E-01+I*(1.34595409692787E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.66493185693462E-01+I*(-2.13712356633743E-01):b := 9.28581535954607E-01+I*(-1.14043469988477E+00):c := -3.31734797334724E-01+I*(5.79197489119343E-01):d := -1.20319168416264E-01+I*(-2.86248124794161E-01):e := -4.62689122189858E-01+I*(3.83025150284669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.68335746765308E-01+I*(6.08619605805001E-02):b := 9.10173163667041E-01+I*(-7.87511965314568E-01):c := -1.10372306121899E-01+I*(3.76556910103024E-01):d := -8.73768230462677E-02+I*(-2.16013058747196E-01):e := -3.59933317148597E-01+I*(2.99438261975171E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69858705703944E-01+I*(3.36661226901386E-01):b := 6.69217171410868E-01+I*(-5.28990139267655E-01):c := 1.89456053598057E-01+I*(3.63614287198109E-01):d := -1.07287752652781E-01+I*(-1.41034945251975E-01):e := -2.72692172707340E-01+I*(2.89872752379934E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.17140564472383E-01+I*(4.84635900449954E-01):b := 3.18459545890314E-01+I*(-4.85834457301439E-01):c := 4.27457260091130E-01+I*(5.46425617503041E-01):d := -1.70735411987582E-01+I*(-9.63968769018252E-02):e := -2.05946690428943E-01+I*(3.10365020195383E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.71569049997842E-01+I*(4.35546986917520E-01):b := 2.20236783232289E-02+I*(-6.78237942629894E-01):c := 4.92267903750438E-01+I*(8.39451447846518E-01):d := -2.48031936105730E-01+I*(-1.02985501974651E-01):e := -1.52530620949742E-01+I*(3.51058891632228E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.61179700446157E-01+I*(2.12363734508412E-01):b := -8.13847943380530E-02+I*(-1.01617286614128E+00):c := 3.53562364117718E-01+I*(1.10558173559147E+00):d := -3.03009422317167E-01+I*(-1.57717929574465E-01):e := -1.12086647286916E-01+I*(4.17720845799139E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.62970456240146E-01+I*(-8.04839325695874E-02):b := 5.66201015218395E-02+I*(-1.34151572139630E+00):c := 7.62425047274830E-02+I*(1.22029116139336E+00):d := -3.09943293816862E-01+I*(-2.34984248544139E-01):e := -1.05593391031915E-01+I*(5.27018875546561E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.76103402841768E-01+I*(-3.05969336251396E-01):b := 3.71464341376490E-01+I*(-1.50203497063805E+00):c := -2.09930630144651E-01+I*(1.12990591006620E+00):d := -2.65589115068711E-01+I*(-2.98630689518279E-01):e := -2.18801787777600E-01+I*(6.62641178521843E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.11984288667912E-01+I*(-3.58585350163175E-01):b := 7.15828806293945E-01+I*(-1.42262187317357E+00):c := -3.71053450231886E-01+I*(8.76718245226157E-01):d := -1.90700699250760E-01+I*(-3.18876375413684E-01):e := -4.55574939830287E-01+I*(5.94888014805408E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.11795968029291E-01+I*(-2.20443089071272E-03):b := 1.02681723571719E+00+I*(-1.07691343173355E+00):c := -1.29740407474068E-01+I*(6.22363737752411E-01):d := -1.08294240857194E-01+I*(-5.92838503319539E-01):e := -2.77277389371973E-01+I*(3.54308279016253E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13638529101138E-01+I*(2.72369886323531E-01):b := 1.00840886342963E+00+I*(-7.23990697163348E-01):c := 9.16220837387576E-02+I*(4.19723158736091E-01):d := -7.53518954871979E-02+I*(-5.22603437272574E-01):e := -2.39770640898473E-01+I*(2.84887305398882E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.15161488039774E-01+I*(5.48169152644416E-01):b := 7.67452871173456E-01+I*(-4.65468871116435E-01):c := 3.91450443458713E-01+I*(4.06780535831177E-01):d := -9.52628250937114E-02+I*(-4.47625323777353E-01):e := -1.88099479082509E-01+I*(2.61904519663539E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.75566531917868E-02+I*(6.96143826192985E-01):b := 4.16695245652901E-01+I*(-4.22313189150220E-01):c := 6.29451649951786E-01+I*(5.89591866136108E-01):d := -1.58710484428513E-01+I*(-4.02987255427203E-01):e := -1.42492989768322E-01+I*(2.65239024029830E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.26266267662012E-01+I*(6.47054912660551E-01):b := 1.20259378085816E-01+I*(-6.14716674478675E-01):c := 6.94262293611094E-01+I*(8.82617696479585E-01):d := -2.36007008546661E-01+I*(-4.09575880500028E-01):e := -1.04584783400801E-01+I*(2.85897791974262E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.15876918110327E-01+I*(4.23871660251443E-01):b := 1.68509054245344E-02+I*(-9.52651597990063E-01):c := 5.55556753978374E-01+I*(1.14874798422454E+00):d := -2.90984494758098E-01+I*(-4.64308308099843E-01):e := -7.62144887873027E-02+I*(3.24332152350533E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.17667673904316E-01+I*(1.31023993173444E-01):b := 1.54855801284427E-01+I*(-1.27799445324508E+00):c := 2.78236894588139E-01+I*(1.26345741002642E+00):d := -2.97918366257794E-01+I*(-5.41574627069517E-01):e := -6.94606296161511E-02+I*(3.85413972132277E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.30800620505938E-01+I*(-9.44614105083653E-02):b := 4.69700041139077E-01+I*(-1.43851370248683E+00):c := -7.93624028399449E-03+I*(1.17307215869927E+00):d := -2.53564187509642E-01+I*(-6.05221068043657E-01):e := -1.19573839334908E-01+I*(4.56609081048971E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.27129289962586E-02+I*(-1.47077424420144E-01):b := 8.14064506056532E-01+I*(-1.35910060502235E+00):c := -1.69059060371230E-01+I*(9.19884493859224E-01):d := -1.78675771691691E-01+I*(-6.25466753939063E-01):e := -2.32583839260325E-01+I*(4.52400049272625E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26636499464341E-02+I*(6.03825855328474E-02):b := 1.06123946351705E+00+I*(-9.65108626610160E-01):c := -2.75045735808795E-03+I*(7.85270493676686E-01):d := 9.79898846435581E-02+I*(-8.19970884660301E-01):e := -1.54439272182824E-01+I*(3.62644512041444E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.91789111254125E-02+I*(3.34956902747091E-01):b := 1.04283109122948E+00+I*(-6.12185892039958E-01):c := 2.18612033854738E-01+I*(5.82629914660366E-01):d := 1.30932230013554E-01+I*(-7.49735818613336E-01):e := -1.53919919160714E-01+I*(3.00042112373074E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.92981299359516E-02+I*(6.10756169067976E-01):b := 8.01875098973310E-01+I*(-3.53664065993045E-01):c := 5.18440393574693E-01+I*(5.69687291755452E-01):d := 1.11021300407041E-01+I*(-6.74757705118115E-01):e := -1.22702386444171E-01+I*(2.65616795676430E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.92016271167512E-01+I*(7.58730842616545E-01):b := 4.51117473452755E-01+I*(-3.10508384026829E-01):c := 7.56441600067766E-01+I*(7.52498622060383E-01):d := 4.75736410722392E-02+I*(-6.30119636767965E-01):e := -8.69990443227512E-02+I*(2.55286802337846E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.80725885637737E-01+I*(7.09641929084110E-01):b := 1.54681605885671E-01+I*(-5.02911869355284E-01):c := 8.21252243727074E-01+I*(1.04552445240386E+00):d := -2.97228830459087E-02+I*(-6.36708261840791E-01):e := -5.36661352031387E-02+I*(2.61563053258502E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.70336536086052E-01+I*(4.86458676675003E-01):b := 5.12731332243890E-02+I*(-8.40846792866673E-01):c := 6.82546704094354E-01+I*(1.31165474014882E+00):d := -8.47003692573460E-02+I*(-6.91440689440605E-01):e := -2.50950652121390E-02+I*(2.83024047126278E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.72127291880041E-01+I*(1.93611009597004E-01):b := 1.89278029084281E-01+I*(-1.16618964812169E+00):c := 4.05226844704120E-01+I*(1.42636416595070E+00):d := -9.16342407570416E-02+I*(-7.68707008410279E-01):e := -8.03720299451146E-03+I*(3.22715357922039E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.85260238481663E-01+I*(-3.18743940848052E-02):b := 5.04122268938932E-01+I*(-1.32670889736344E+00):c := 1.19053709831985E-01+I*(1.33597891462354E+00):d := -4.72800620088895E-02+I*(-8.32353449384420E-01):e := -2.31225542272359E-02+I*(3.78338169217336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.97172546971984E-01+I*(-8.44904079965835E-02):b := 8.48486733856386E-01+I*(-1.24729579989896E+00):c := -4.20691102552499E-02+I*(1.08279124978350E+00):d := 2.76083538090611E-02+I*(-8.52599135279825E-01):e := -9.15659057800575E-02+I*(4.08256241190162E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.77821184979229E-01+I*(-5.52364679248547E-02):b := 1.01574167640617E+00+I*(-8.57334995403833E-01):c := -1.01849559821386E-02+I*(9.91691875288280E-01):d := 4.02010573171507E-01+I*(-8.61367503291866E-01):e := -5.04454402198947E-02+I*(3.87150605008803E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.75978623907382E-01+I*(2.19337849289389E-01):b := 9.97333304118603E-01+I*(-5.04412260833631E-01):c := 2.11177535230687E-01+I*(7.89051296271960E-01):d := 4.34952918541503E-01+I*(-7.91132437244900E-01):e := -8.06001182366501E-02+I*(3.32029842916894E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.74455664968746E-01+I*(4.95137115610274E-01):b := 7.56377311862431E-01+I*(-2.45890434786718E-01):c := 5.11005894950642E-01+I*(7.76108673367046E-01):d := 4.15041988934990E-01+I*(-7.16154323749680E-01):e := -6.67490735501142E-02+I*(2.86724131633919E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.27173806200306E-01+I*(6.43111789158843E-01):b := 4.05619686341876E-01+I*(-2.02734752820502E-01):c := 7.49007101443716E-01+I*(9.58920003671977E-01):d := 3.51594329600188E-01+I*(-6.71516255399530E-01):e := -3.78297669416139E-02+I*(2.63735330003099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.15883420670531E-01+I*(5.94022875626409E-01):b := 1.09183818774791E-01+I*(-3.95138238148957E-01):c := 8.13817745103024E-01+I*(1.25194583401545E+00):d := 2.74297805482040E-01+I*(-6.78104880472355E-01):e := -5.96671407905720E-03+I*(2.57966549342395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00549407111885E+00+I*(3.70839623217301E-01):b := 5.77534611350963E-03+I*(-7.33073161660345E-01):c := 6.75112205470304E-01+I*(1.51807612176041E+00):d := 2.19320319270603E-01+I*(-7.32837308072170E-01):e := 2.53463231265214E-02+I*(2.67035954874083E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00728482691284E+00+I*(7.79919561393021E-02):b := 1.43780241973402E-01+I*(-1.05841601691536E+00):c := 3.97792346080069E-01+I*(1.63278554756229E+00):d := 2.12386447770908E-01+I*(-8.10103627041844E-01):e := 5.20899742515794E-02+I*(2.93562101072788E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.20417773514458E-01+I*(-1.47493447542507E-01):b := 4.58624481828052E-01+I*(-1.21893526615711E+00):c := 1.11619211207935E-01+I*(1.54240029623514E+00):d := 2.56740626519059E-01+I*(-8.73750068015984E-01):e := 6.04165548984294E-02+I*(3.41553186191097E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.32330082004779E-01+I*(-2.00109461454286E-01):b := 8.02988946745507E-01+I*(-1.13952216869263E+00):c := -4.95036088793008E-02+I*(1.28921263139509E+00):d := 3.31629042337010E-01+I*(-8.93995753911390E-01):e := 2.16801604885350E-02+I*(3.92846063478015E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.83643812942361E-01+I*(-2.94962151188312E-01):b := 9.11612794625316E-01+I*(-8.04021017926501E-01):c := -1.48565218814778E-01+I*(1.14504102401301E+00):d := 6.61513165750837E-01+I*(-6.97658421284355E-01):e := 5.88597969446306E-02+I*(4.32288935938231E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.81801251870514E-01+I*(-2.03878339740692E-02):b := 8.93204422337750E-01+I*(-4.51098283356299E-01):c := 7.27972723980470E-02+I*(9.42400444996693E-01):d := 6.94455511120833E-01+I*(-6.27423355237389E-01):e := -7.57183410683078E-03+I*(3.88128361148479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.80278292931878E-01+I*(2.55411432346816E-01):b := 6.52248430081578E-01+I*(-1.92576457309386E-01):c := 3.72625632118002E-01+I*(9.29457822091779E-01):d := 6.74544581514320E-01+I*(-5.52445241742169E-01):e := -1.40448352076443E-02+I*(3.28380874193600E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.32996434163439E-01+I*(4.03386105895385E-01):b := 3.01490804561023E-01+I*(-1.49420775343170E-01):c := 6.10626838611076E-01+I*(1.11226915239671E+00):d := 6.11096922179518E-01+I*(-5.07807173392019E-01):e := 9.02177510791118E-03+I*(2.89864413693181E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.21706048633664E-01+I*(3.54297192362950E-01):b := 5.05493699393813E-03+I*(-3.41824260671625E-01):c := 6.75437482270383E-01+I*(1.40529498274019E+00):d := 5.33800398061371E-01+I*(-5.14395798464844E-01):e := 4.13826171414811E-02+I*(2.71019200129892E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.11131669908198E+00+I*(1.31113939953843E-01):b := -9.83535356673438E-02+I*(-6.79759184183013E-01):c := 5.36731942637664E-01+I*(1.67142527048514E+00):d := 4.78822911849933E-01+I*(-5.69128226064658E-01):e := 7.73115623310492E-02+I*(2.68183548226753E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.11310745487597E+00+I*(-1.61733727124156E-01):b := 3.96513601925487E-02+I*(-1.00510203943803E+00):c := 2.59412083247429E-01+I*(1.78613469628703E+00):d := 4.71889040350238E-01+I*(-6.46394545034332E-01):e := 1.14518042455548E-01+I*(2.83338175946710E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.26240401477590E-01+I*(-3.87219130805966E-01):b := 3.54495600047199E-01+I*(-1.16562128867978E+00):c := -2.67610516247052E-02+I*(1.69574944495987E+00):d := 5.16243219098390E-01+I*(-7.10040986008473E-01):e := 1.44395194843903E-01+I*(3.24886146183438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.38152709967911E-01+I*(-4.39835144717743E-01):b := 6.98860064964654E-01+I*(-1.08620819121530E+00):c := -1.87883871711940E-01+I*(1.44256178011983E+00):d := 5.91131634916340E-01+I*(-7.30286671903879E-01):e := 1.35513442792614E-01+I*(3.94105722838352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.10615950124375E-01+I*(-5.46624152804354E-01):b := 7.97575879223364E-01+I*(-8.30112896758667E-01):c := -3.53141582951302E-01+I*(1.17356416887663E+00):d := 7.55073515263616E-01+I*(-4.05444937532865E-01):e := 2.00412397681246E-01+I*(5.28683523000164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.08773389052529E-01+I*(-2.72049835590110E-01):b := 7.79167506935798E-01+I*(-4.77190162188465E-01):c := -1.31779091738476E-01+I*(9.70923589860312E-01):d := 7.88015860633612E-01+I*(-3.35209871485900E-01):e := 6.84731617878611E-02+I*(5.01331496331498E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.07250430113893E-01+I*(3.74943073077563E-03):b := 5.38211514679626E-01+I*(-2.18668336141552E-01):c := 1.68049267981479E-01+I*(9.57980966955398E-01):d := 7.68104931027098E-01+I*(-2.60231757990680E-01):e := 3.17950714246915E-02+I*(4.10357712756090E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.59968571345454E-01+I*(1.51724104279344E-01):b := 1.87453889159071E-01+I*(-1.75512654175336E-01):c := 4.06050474474553E-01+I*(1.14079229726033E+00):d := 7.04657271692297E-01+I*(-2.15593689640530E-01):e := 5.19194320460243E-02+I*(3.45655442630113E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.48678185815678E-01+I*(1.02635190746909E-01):b := -1.08981978408013E-01+I*(-3.67916139503791E-01):c := 4.70861118133861E-01+I*(1.43381812760381E+00):d := 6.27360747574149E-01+I*(-2.22182314713355E-01):e := 8.96564720539832E-02+I*(3.08580170091551E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.03828883626399E+00+I*(-1.20548061662198E-01):b := -2.12390451069295E-01+I*(-7.05851063015180E-01):c := 3.32155578501141E-01+I*(1.69994841534876E+00):d := 5.72383261362712E-01+I*(-2.76914742313170E-01):e := 1.35078734673490E-01+I*(2.91299987579950E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.04007959205798E+00+I*(-4.13395728740198E-01):b := -7.43855552094024E-02+I*(-1.03119391827020E+00):c := 5.48357191109053E-02+I*(1.81465784115064E+00):d := 5.65449389863017E-01+I*(-3.54181061282843E-01):e := 1.87756750939257E-01+I*(2.93874415626962E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.53212538659605E-01+I*(-6.38881132422006E-01):b := 2.40458684645248E-01+I*(-1.19171316751194E+00):c := -2.31337415761228E-01+I*(1.72427258982349E+00):d := 6.09803568611168E-01+I*(-4.17827502256984E-01):e := 2.45561056534829E-01+I*(3.28460339361436E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.65124847149925E-01+I*(-6.91497146333785E-01):b := 5.84823149562702E-01+I*(-1.11230007004747E+00):c := -3.92460235848463E-01+I*(1.47108492498345E+00):d := 6.84691984429118E-01+I*(-4.38073188152389E-01):e := 2.79099805815886E-01+I*(4.19891933274543E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.29081451520966E-02+I*(-6.92467025305232E-01):b := 7.26990070296029E-01+I*(-9.23401951815829E-01):c := -5.28190493999199E-01+I*(1.06391501339801E+00):d := 6.38913694365352E-01+I*(-1.21456988675843E-01):e := 4.01881972257063E-01+I*(8.29009344768518E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.93441591974970E-03+I*(-4.17892708090989E-01):b := 7.08581698008463E-01+I*(-5.70479217245626E-01):c := -3.06828002786373E-01+I*(8.61274434381687E-01):d := 6.71856039735348E-01+I*(-5.12219226288776E-02):e := 6.89251391215751E-02+I*(7.74476647351230E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.95426251416143E-02+I*(-1.42093441770103E-01):b := 4.67625705752291E-01+I*(-3.11957391198713E-01):c := -6.99964306641856E-03+I*(8.48331811476772E-01):d := 6.51945110128835E-01+I*(2.37561908663429E-02):e := 1.12386683590394E-02+I*(5.72764861731942E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.42260766373175E-01+I*(5.88123177846590E-03):b := 1.16868080231736E-01+I*(-2.68801709232498E-01):c := 2.31001563426655E-01+I*(1.03114314178170E+00):d := 5.88497450794033E-01+I*(6.83942592164929E-02):e := 5.77056404360626E-02+I*(4.57379488876020E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.30970380843400E-01+I*(-4.32076817539687E-02):b := -1.79567787335349E-01+I*(-4.61205194560952E-01):c := 2.95812207085963E-01+I*(1.32416897212518E+00):d := 5.11200926675885E-01+I*(6.18056341436676E-02):e := 1.22129736669493E-01+I*(3.94891021206864E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.20581031291715E-01+I*(-2.66390934163076E-01):b := -2.82976259996630E-01+I*(-7.99140118072341E-01):c := 1.57106667453244E-01+I*(1.59029925987014E+00):d := 4.56223440464448E-01+I*(7.07320654385302E-03):e := 1.94308299045308E-01+I*(3.60872068201890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.22371787085704E-01+I*(-5.59238601241075E-01):b := -1.44971364136738E-01+I*(-1.12448297332736E+00):c := -1.20213191936991E-01+I*(1.70500868567202E+00):d := 4.49289568964753E-01+I*(-7.01931124258209E-02):e := 2.80410202665483E-01+I*(3.50774619751942E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.35504733687326E-01+I*(-7.84724004922885E-01):b := 1.69872875717913E-01+I*(-1.28500222256911E+00):c := -4.06386326809126E-01+I*(1.61462343434486E+00):d := 4.93643747712905E-01+I*(-1.33839553399961E-01):e := 3.91786474155922E-01+I*(3.82560992992104E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.47417042177647E-01+I*(-8.37340018834663E-01):b := 5.14237340635367E-01+I*(-1.20558912510463E+00):c := -5.67509146896361E-01+I*(1.36143576950482E+00):d := 5.68532163530855E-01+I*(-1.54085239295367E-01):e := 5.12741572282583E-01+I*(5.29127019287753E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.67611700475206E-01+I*(-6.64249267784805E-01):b := 7.32883252314295E-01+I*(-1.04023719744438E+00):c := -5.91804621027215E-01+I*(8.67399616040207E-01):d := 3.67386174226953E-01+I*(2.14243078420245E-02):e := -2.50802150678448E-01+I*(1.76071133511433E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.69454261547052E-01+I*(-3.89674950570562E-01):b := 7.14474880026729E-01+I*(-6.87314462874178E-01):c := -3.70442129814390E-01+I*(6.64759037023887E-01):d := 4.00328519596949E-01+I*(9.16593738889898E-02):e := -4.69873654306931E-01+I*(9.22006668776018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.70977220485688E-01+I*(-1.13875684249676E-01):b := 4.73518887770557E-01+I*(-4.28792636827265E-01):c := -7.06137700944348E-02+I*(6.51816414118973E-01):d := 3.80417589990436E-01+I*(1.66637487384210E-01):e := -2.56070255496176E-01+I*(6.54415599729777E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.17409207458727E-02+I*(3.40989892988928E-02):b := 1.22761262250002E-01+I*(-3.85636954861049E-01):c := 1.67387436398639E-01+I*(8.34627744423905E-01):d := 3.16969930655634E-01+I*(2.11275555734360E-01):e := -9.13450455662841E-02+I*(5.62518930118393E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70450535216098E-01+I*(-1.49899242335417E-02):b := -1.73674605317083E-01+I*(-5.78040440189504E-01):c := 2.32198080057947E-01+I*(1.12765357476738E+00):d := 2.39673406537486E-01+I*(2.04686930661535E-01):e := 4.49732904610370E-02+I*(5.24910565033477E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.60061185664413E-01+I*(-2.38173176642650E-01):b := -2.77083077978365E-01+I*(-9.15975363700892E-01):c := 9.34925404252270E-02+I*(1.39378386251234E+00):d := 1.84695920326049E-01+I*(1.49954503061721E-01):e := 1.80203513651446E-01+I*(5.15669679046273E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.61851941458402E-01+I*(-5.31020843720649E-01):b := -1.39078182118472E-01+I*(-1.24131821895591E+00):c := -1.83827318965008E-01+I*(1.50849328831422E+00):d := 1.77762048826354E-01+I*(7.26881840920465E-02):e := 3.43001514899572E-01+I*(5.40218136891570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.74984888060024E-01+I*(-7.56506247402458E-01):b := 1.75766057736178E-01+I*(-1.40183746819766E+00):c := -4.70000453837142E-01+I*(1.41810803698706E+00):d := 2.22116227574506E-01+I*(9.04174311790640E-03):e := 5.79595169177159E-01+I*(6.57980853497696E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.68971965503442E-02+I*(-8.09122261314236E-01):b := 5.20130522653633E-01+I*(-1.32242437073318E+00):c := -6.31123273924378E-01+I*(1.16492037214702E+00):d := 2.97004643392456E-01+I*(-1.12039427774994E-02):e := 8.49654461983320E-01+I*(1.20300295732479E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.92600405096756E-01+I*(-4.82407693617401E-01):b := 9.89345045432065E-01+I*(-9.33948402961457E-01):c := -9.73236958391811E-01+I*(7.48877774899008E-01):d := 2.98165377403257E-01+I*(-4.47324576932098E-02):e := 7.84645867735203E-02+I*(1.02075793245837E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.94442966168602E-01+I*(-2.07833376403157E-01):b := 9.70936673144499E-01+I*(-5.81025668391255E-01):c := -7.51874467178985E-01+I*(5.46237195882689E-01):d := 3.31107722773253E-01+I*(2.55026083537556E-02):e := -1.65968981747008E-01+I*(7.45373624160842E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.95965925107238E-01+I*(6.79658899177287E-02):b := 7.29980680888326E-01+I*(-3.22503842344342E-01):c := -4.52046107459030E-01+I*(5.33294572977774E-01):d := 3.11196793166739E-01+I*(1.00480721848976E-01):e := -1.14988968830704E-01+I*(5.49863958280101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.32477838756774E-02+I*(2.15940563466297E-01):b := 3.79223055367772E-01+I*(-2.79348160378127E-01):c := -2.14044900965956E-01+I*(7.16105903282706E-01):d := 2.47749133831938E-01+I*(1.45118790199126E-01):e := -2.74188393949112E-02+I*(4.63646852554974E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.45461830594547E-01+I*(1.66851649933862E-01):b := 8.27871878006870E-02+I*(-4.71751645706582E-01):c := -1.49234257306648E-01+I*(1.00913173362618E+00):d := 1.70452609713790E-01+I*(1.38530165126301E-01):e := 5.82415885211779E-02+I*(4.25212674522488E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.35072481042863E-01+I*(-5.63316024752450E-02):b := -2.06212848605949E-02+I*(-8.09686569217970E-01):c := -2.87939796939368E-01+I*(1.27526202137114E+00):d := 1.15475123502353E-01+I*(8.37977375264861E-02):e := 1.46415835503419E-01+I*(4.14370880252123E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.36863236836852E-01+I*(-3.49179269553245E-01):b := 1.17383610999298E-01+I*(-1.13502942447299E+00):c := -5.65259656329604E-01+I*(1.38997144717302E+00):d := 1.08541252002658E-01+I*(6.53141855681218E-03):e := 2.48002663511042E-01+I*(4.34222170062523E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.49996183438473E-01+I*(-5.74664673235053E-01):b := 4.32227850853949E-01+I*(-1.29554867371473E+00):c := -8.51432791201738E-01+I*(1.29958619584587E+00):d := 1.52895430750810E-01+I*(-5.71150224173277E-02):e := 3.71357763745966E-01+I*(5.20658340969734E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.80915080712060E-02+I*(-6.27280687146832E-01):b := 7.76592315771403E-01+I*(-1.21613557625026E+00):c := -1.01255561128897E+00+I*(1.04639853100582E+00):d := 2.27783846568760E-01+I*(-7.73607083127337E-02):e := 4.39336524528813E-01+I*(7.82200210200948E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.10050135157272E-01+I*(-2.20945767658821E-01):b := 1.10542864147028E+00+I*(-9.48432979110623E-01):c := -7.90753548719863E-01+I*(6.52105548766040E-01):d := 1.10304509773571E-01+I*(-2.87323787918667E-01):e := -1.90865634572864E-01+I*(6.34455020295108E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.11892696229118E-01+I*(5.36285495554228E-02):b := 1.08702026918271E+00+I*(-5.95510244540421E-01):c := -5.69391057507037E-01+I*(4.49464969749720E-01):d := 1.43246855143567E-01+I*(-2.17088721871702E-01):e := -2.15123504206541E-01+I*(4.73876047390374E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13415655167754E-01+I*(3.29427815876309E-01):b := 8.46064276926541E-01+I*(-3.36988418493508E-01):c := -2.69562697787082E-01+I*(4.36522346844806E-01):d := 1.23335925537054E-01+I*(-1.42110608376482E-01):e := -1.54284990612146E-01+I*(3.90784304826328E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.06975139361936E-02+I*(4.77402489424877E-01):b := 4.95306651405986E-01+I*(-2.93832736527293E-01):c := -3.15614912940081E-02+I*(6.19333677149737E-01):d := 5.98882662022523E-02+I*(-9.74725400263319E-02):e := -8.75445659331108E-02+I*(3.60300648791071E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.28012100534031E-01+I*(4.28313575892443E-01):b := 1.98870783838901E-01+I*(-4.86236221855747E-01):c := 3.32491523652998E-02+I*(9.12359507493214E-01):d := -1.74082579158955E-02+I*(-1.04061165099157E-01):e := -2.49165614481187E-02+I*(3.57991448415966E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.17622750982346E-01+I*(2.05130323483335E-01):b := 9.54623111776194E-02+I*(-8.24171145367136E-01):c := -1.05456387267420E-01+I*(1.17848979523817E+00):d := -7.23857441273325E-02+I*(-1.58793592698972E-01):e := 3.59498921415289E-02+I*(3.78722739577696E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.19413506776336E-01+I*(-8.77173435946646E-02):b := 2.33467207037512E-01+I*(-1.14951400062215E+00):c := -3.82776246657656E-01+I*(1.29319922104005E+00):d := -7.93196156270277E-02+I*(-2.36059911668646E-01):e := 9.43949245522051E-02+I*(4.32296471369205E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.32546453377957E-01+I*(-3.13202747276473E-01):b := 5.48311446892163E-01+I*(-1.31003324986390E+00):c := -6.68949381529789E-01+I*(1.20281396971290E+00):d := -3.49654368788759E-02+I*(-2.99706352642786E-01):e := 1.24400852968100E-01+I*(5.44836016181018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.55412381317220E-02+I*(-3.65818761188252E-01):b := 8.92675911809617E-01+I*(-1.23062015239942E+00):c := -8.30072201617025E-01+I*(9.49626304872853E-01):d := 3.99229789390743E-02+I*(-3.19952038538191E-01):e := 1.73598395380622E-02+I*(6.92424095778330E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55352917493102E-01+I*(-9.43784191578989E-03):b := 1.20366434123287E+00+I*(-8.84911710959404E-01):c := -5.88759158859207E-01+I*(6.95271797399107E-01):d := 1.22329437332640E-01+I*(-5.93914166444046E-01):e := -1.08182114847883E-01+I*(4.42108443733489E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.57195478564948E-01+I*(2.65136475298454E-01):b := 1.18525596894530E+00+I*(-5.31988976389202E-01):c := -3.67396667646381E-01+I*(4.92631218382787E-01):d := 1.55271782702637E-01+I*(-5.23679100397080E-01):e := -1.31138892060883E-01+I*(3.62682454240482E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.58718437503584E-01+I*(5.40935741619339E-01):b := 9.44299976689128E-01+I*(-2.73467150342289E-01):c := -6.75683079264260E-02+I*(4.79688595477873E-01):d := 1.35360853096123E-01+I*(-4.48700986901860E-01):e := -1.02833058824413E-01+I*(3.10453441397341E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.39997037279764E-02+I*(6.88910415167908E-01):b := 5.93542351168573E-01+I*(-2.30311468376073E-01):c := 1.70432898566648E-01+I*(6.62499925782804E-01):d := 7.19131937613218E-02+I*(-4.04062918551710E-01):e := -6.30968674144696E-02+I*(2.88354278957021E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.82709318198202E-01+I*(6.39821501635473E-01):b := 2.97106483601489E-01+I*(-4.22714953704528E-01):c := 2.35243542225956E-01+I*(9.55525756126281E-01):d := -5.38333035682611E-03+I*(-4.10651543624535E-01):e := -2.31932184367150E-02+I*(2.86418269682587E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.72319968646517E-01+I*(4.16638249226366E-01):b := 1.93698010940207E-01+I*(-7.60649877215916E-01):c := 9.65380025932364E-02+I*(1.22165604387124E+00):d := -6.03608165682633E-02+I*(-4.65383971224349E-01):e := 1.46997071623594E-02+I*(3.01798124496532E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.74110724440506E-01+I*(1.23790582148366E-01):b := 3.31702906800099E-01+I*(-1.08599273247093E+00):c := -1.80781856797000E-01+I*(1.33636546967312E+00):d := -6.72946880679585E-02+I*(-5.42650290194023E-01):e := 4.61843313371442E-02+I*(3.38925945109920E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.87243671042127E-01+I*(-1.01694821533442E-01):b := 6.46547146654750E-01+I*(-1.24651198171268E+00):c := -4.66954991669133E-01+I*(1.24598021834596E+00):d := -2.29405093198068E-02+I*(-6.06296731168163E-01):e := 5.16702485891614E-02+I*(4.04374675599840E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.91559795324478E-02+I*(-1.54310835445221E-01):b := 9.90911611572205E-01+I*(-1.16709888424821E+00):c := -6.28077811756369E-01+I*(9.92792553505921E-01):d := 5.19479064981436E-02+I*(-6.26542417063569E-01):e := -1.12596061733002E-02+I*(4.68761503149384E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.91067004826234E-02+I*(5.31491745077704E-02):b := 1.23808656903272E+00+I*(-7.73106905836013E-01):c := -4.61769208743227E-01+I*(8.58178553323382E-01):d := 3.28613562833393E-01+I*(-8.21046547784808E-01):e := -1.97656715661112E-02+I*(3.66865920588912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73586058922291E-03+I*(3.27723491722014E-01):b := 1.21967819674515E+00+I*(-4.20184171265811E-01):c := -2.40406717530401E-01+I*(6.55537974307062E-01):d := 3.61555908203389E-01+I*(-7.50811481737842E-01):e := -5.38791531276330E-02+I*(3.21862580290998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.57411804721411E-02+I*(6.03522758042900E-01):b := 9.78722204488983E-01+I*(-1.61662345218899E-01):c := 5.94216421895545E-02+I*(6.42595351402148E-01):d := 3.41644978596875E-01+I*(-6.75833368242622E-01):e := -4.68610859620647E-02+I*(2.78954757016510E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.48459321703702E-01+I*(7.51497431591468E-01):b := 6.27964578968428E-01+I*(-1.18506663252683E-01):c := 2.97422848682628E-01+I*(8.25406681707080E-01):d := 2.78197319262074E-01+I*(-6.31195299892472E-01):e := -2.28023933328783E-02+I*(2.54811653112517E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.37168936173927E-01+I*(7.02408518059033E-01):b := 3.31528711401343E-01+I*(-3.10910148581138E-01):c := 3.62233492341936E-01+I*(1.11843251205056E+00):d := 2.00900795143926E-01+I*(-6.37783924965297E-01):e := 5.77519587587985E-03+I*(2.46629179367081E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.26779586622242E-01+I*(4.79225265649926E-01):b := 2.28120238740061E-01+I*(-6.48845072092526E-01):c := 2.23527952709216E-01+I*(1.38456279979551E+00):d := 1.45923308932489E-01+I*(-6.92516352565112E-01):e := 3.48203122597662E-02+I*(2.52301739472318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.28570342416231E-01+I*(1.86377598571926E-01):b := 3.66125134599954E-01+I*(-9.74187927347543E-01):c := -5.37919066810195E-02+I*(1.49927222559740E+00):d := 1.38989437432794E-01+I*(-7.69782671534786E-01):e := 6.06330514823614E-02+I*(2.73891963697521E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.41703289017853E-01+I*(-3.91078051098822E-02):b := 6.80969374454605E-01+I*(-1.13470717658929E+00):c := -3.39965041553153E-01+I*(1.40888697427024E+00):d := 1.83343616180946E-01+I*(-8.33429112508925E-01):e := 7.17245071227958E-02+I*(3.15127886573003E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.53615597508173E-01+I*(-9.17238190216609E-02):b := 1.02533383937206E+00+I*(-1.05529407912482E+00):c := -5.01087861640389E-01+I*(1.15569930943020E+00):d := 2.58232031998896E-01+I*(-8.53674798404332E-01):e := 4.33839973830203E-02+I*(3.63024639764727E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.34264235515418E-01+I*(-6.24698789499321E-02):b := 1.19258878192184E+00+I*(-6.65333274629687E-01):c := -4.69203707367278E-01+I*(1.06459993493498E+00):d := 6.32634251361342E-01+I*(-8.62443166416372E-01):e := 5.86192253325438E-02+I*(3.31687502623182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.32421674443571E-01+I*(2.12104438264311E-01):b := 1.17418040963428E+00+I*(-3.12410540059485E-01):c := -2.47841216154452E-01+I*(8.61959355918656E-01):d := 6.65576596731337E-01+I*(-7.92208100369407E-01):e := 1.50518202672588E-02+I*(3.09066182465636E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.30898715504936E-01+I*(4.87903704585197E-01):b := 9.33224417378103E-01+I*(-5.38887140125712E-02):c := 5.19871435655031E-02+I*(8.49016733013742E-01):d := 6.45665667124824E-01+I*(-7.17229986874186E-01):e := 5.67833809155995E-03+I*(2.70729910475698E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.83616856736497E-01+I*(6.35878378133767E-01):b := 5.82466791857549E-01+I*(-1.07330320463556E-02):c := 2.89988350058577E-01+I*(1.03182806331867E+00):d := 5.82218007790023E-01+I*(-6.72591918524037E-01):e := 1.86217120856973E-02+I*(2.42534544967505E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.72326471206721E-01+I*(5.86789464601331E-01):b := 2.86030924290464E-01+I*(-2.03136517374810E-01):c := 3.54798993717885E-01+I*(1.32485389366215E+00):d := 5.04921483671876E-01+I*(-6.79180543596862E-01):e := 4.05219972370861E-02+I*(2.27631974847402E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06193712165504E+00+I*(3.63606212192223E-01):b := 1.82622451629182E-01+I*(-5.41071440886199E-01):c := 2.16093454085165E-01+I*(1.59098418140711E+00):d := 4.49943997460438E-01+I*(-7.33912971196676E-01):e := 6.58938266316195E-02+I*(2.24887018653912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06372787744903E+00+I*(7.07585451142237E-02):b := 3.20627347489074E-01+I*(-8.66414296141216E-01):c := -6.12264053050707E-02+I*(1.70569360720899E+00):d := 4.43010125960743E-01+I*(-8.11179290166350E-01):e := 9.16450236085384E-02+I*(2.35641622993983E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.76860824050647E-01+I*(-1.54726858567585E-01):b := 6.35471587343725E-01+I*(-1.02693354538296E+00):c := -3.47399540177204E-01+I*(1.61530835588183E+00):d := 4.87364304708895E-01+I*(-8.74825731140490E-01):e := 1.10569758581570E-01+I*(2.63988157732962E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.88773132540968E-01+I*(-2.07342872479363E-01):b := 9.79836052261180E-01+I*(-9.47520447918488E-01):c := -5.08522360264440E-01+I*(1.36212069104179E+00):d := 5.62252720526845E-01+I*(-8.95071417035896E-01):e := 1.03848503006035E-01+I*(3.07179834966385E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.40086863478550E-01+I*(-3.02195562213389E-01):b := 1.08845990014099E+00+I*(-6.12019297152354E-01):c := -6.07583970199917E-01+I*(1.21794908365971E+00):d := 8.92136843940672E-01+I*(-6.98734084408862E-01):e := 1.37939681517221E-01+I*(3.16557495130635E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.38244302406704E-01+I*(-2.76212449991461E-02):b := 1.07005152785342E+00+I*(-2.59096562582152E-01):c := -3.86221478987091E-01+I*(1.01530850464339E+00):d := 9.25079189310668E-01+I*(-6.28499018361896E-01):e := 8.48934775747722E-02+I*(3.15053229938605E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.36721343468068E-01+I*(2.48178021321740E-01):b := 8.29095535597250E-01+I*(-5.74736535239537E-04):c := -8.63931192671362E-02+I*(1.00236588173848E+00):d := 9.05168259704154E-01+I*(-5.53520904866676E-01):e := 5.86544448830198E-02+I*(2.79811756047023E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.89439484699628E-01+I*(3.96152694870308E-01):b := 4.78337910076695E-01+I*(4.25809454309762E-02):c := 1.51608087225937E-01+I*(1.18517721204341E+00):d := 8.41720600369353E-01+I*(-5.08882836516526E-01):e := 6.12788522767314E-02+I*(2.45801257698478E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.78149099169854E-01+I*(3.47063781337874E-01):b := 1.81902042509611E-01+I*(-1.49822539897479E-01):c := 2.16418730885245E-01+I*(1.47820304238688E+00):d := 7.64424076251205E-01+I*(-5.15471461589352E-01):e := 7.82402291133608E-02+I*(2.23241366752506E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16775974961817E+00+I*(1.23880528928766E-01):b := 7.84935698483288E-02+I*(-4.87757463408867E-01):c := 7.77131912525263E-02+I*(1.74433333013184E+00):d := 7.09446590039768E-01+I*(-5.70203889189166E-01):e := 1.02071886830907E-01+I*(2.12256561144299E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16955050541216E+00+I*(-1.68967138149233E-01):b := 2.16498465708222E-01+I*(-8.13100318663884E-01):c := -1.99606668137710E-01+I*(1.85904275593372E+00):d := 7.02512718540072E-01+I*(-6.47470208158840E-01):e := 1.29775820957857E-01+I*(2.13862446819746E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.82683452013779E-01+I*(-3.94452541831042E-01):b := 5.31342705562872E-01+I*(-9.73619567905631E-01):c := -4.85779803009843E-01+I*(1.76865750460657E+00):d := 7.46866897288224E-01+I*(-7.11116649132980E-01):e := 1.56862557237169E-01+I*(2.32852359227274E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.94595760504100E-01+I*(-4.47068555742820E-01):b := 8.75707170480327E-01+I*(-8.94206470441156E-01):c := -6.46902623097079E-01+I*(1.51546983976652E+00):d := 8.21755313106175E-01+I*(-7.31362335028386E-01):e := 1.68038554365956E-01+I*(2.73842704781036E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67059000660564E-01+I*(-5.53857563829431E-01):b := 9.74422984739037E-01+I*(-6.38111175984521E-01):c := -8.12160334336441E-01+I*(1.24647222852333E+00):d := 9.85697193453450E-01+I*(-4.06520600657371E-01):e := 2.33096763189539E-01+I*(3.22094791002611E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65216439588718E-01+I*(-2.79283246615188E-01):b := 9.56014612451471E-01+I*(-2.85188441414318E-01):c := -5.90797843123615E-01+I*(1.04383164950701E+00):d := 1.01863953882345E+00+I*(-3.36285534610406E-01):e := 1.65741720840058E-01+I*(3.48090424281431E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.63693480650082E-01+I*(-3.48398029430177E-03):b := 7.15058620195299E-01+I*(-2.66666153674058E-02):c := -2.90969483403660E-01+I*(1.03088902660209E+00):d := 9.98728609216933E-01+I*(-2.61307421115186E-01):e := 1.15729947145998E-01+I*(3.13670595003516E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.16411621881643E-01+I*(1.44490693254267E-01):b := 3.64300994674743E-01+I*(1.64890665988100E-02):c := -5.29682769105857E-02+I*(1.21370035690703E+00):d := 9.35280949882131E-01+I*(-2.16669352765036E-01):e := 1.06559954594272E-01+I*(2.69034715335297E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.05121236351868E-01+I*(9.54017797218320E-02):b := 6.78651271076589E-02+I*(-1.75914418729645E-01):c := 1.18423667487219E-02+I*(1.50672618725050E+00):d := 8.57984425763984E-01+I*(-2.23257977837861E-01):e := 1.19863516555825E-01+I*(2.35558884697416E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09473188680018E+00+I*(-1.27781472687275E-01):b := -3.55433455536233E-02+I*(-5.13849342241033E-01):c := -1.26863172883997E-01+I*(1.77285647499546E+00):d := 8.03006939552547E-01+I*(-2.77990405437676E-01):e := 1.44292391240920E-01+I*(2.14594304875002E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09652264259417E+00+I*(-4.20629139765276E-01):b := 1.02461550306270E-01+I*(-8.39192197496050E-01):c := -4.04183032274234E-01+I*(1.88756590079734E+00):d := 7.96073068052852E-01+I*(-3.55256724407349E-01):e := 1.76362256402133E-01+I*(2.06499724308879E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.09655589195794E-01+I*(-6.46114543447084E-01):b := 4.17305790160920E-01+I*(-9.99711446737798E-01):c := -6.90356167146367E-01+I*(1.79718064947018E+00):d := 8.40427246801003E-01+I*(-4.18903165381489E-01):e := 2.13962727487971E-01+I*(2.16651169871102E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.21567897686114E-01+I*(-6.98730557358862E-01):b := 7.61670255078374E-01+I*(-9.20298349273322E-01):c := -8.51478987233603E-01+I*(1.54399298463014E+00):d := 9.15315662618953E-01+I*(-4.39148851276895E-01):e := 2.45389461814124E-01+I*(2.56734143714784E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.49351195688286E-01+I*(-6.99700436330309E-01):b := 9.03837175811702E-01+I*(-7.31400231041682E-01):c := -9.87209245384337E-01+I*(1.13682307304470E+00):d := 8.69537372555186E-01+I*(-1.22532651800350E-01):e := 3.67369248609082E-01+I*(3.78305509082485E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.75086346164399E-02+I*(-4.25126119116065E-01):b := 8.85428803524136E-01+I*(-3.78477496471480E-01):c := -7.65846754171512E-01+I*(9.34182494028383E-01):d := 9.02479717925183E-01+I*(-5.22975857533844E-02):e := 2.60168658967037E-01+I*(4.50401145967405E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.45985675677804E-01+I*(-1.49326852795180E-01):b := 6.44472811267964E-01+I*(-1.19955670424567E-01):c := -4.66018394451557E-01+I*(9.21239871123469E-01):d := 8.82568788318669E-01+I*(2.26805277418360E-02):e := 1.66071345761522E-01+I*(4.00921029271194E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.98703816909365E-01+I*(-1.35217924661083E-03):b := 2.93715185747409E-01+I*(-7.67999884583514E-02):c := -2.28017187958483E-01+I*(1.10405120142840E+00):d := 8.19121128983868E-01+I*(6.73185960919860E-02):e := 1.45666767660766E-01+I*(3.30060412357130E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.87413431379590E-01+I*(-5.04410927790454E-02):b := -2.72068181967601E-03+I*(-2.69203473786806E-01):c := -1.63206544299175E-01+I*(1.39707703177188E+00):d := 7.41824604865720E-01+I*(6.07299710191605E-02):e := 1.61006899358522E-01+I*(2.77713970977526E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.77024081827905E-01+I*(-2.73624345188153E-01):b := -1.06129154480958E-01+I*(-6.07138397298195E-01):c := -3.01912083931894E-01+I*(1.66320731951683E+00):d := 6.86847118654283E-01+I*(5.99754341934591E-03):e := 1.92202893562878E-01+I*(2.42800152424947E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.78814837621894E-01+I*(-5.66472012266152E-01):b := 3.18757413789350E-02+I*(-9.32481252553212E-01):c := -5.79231943322130E-01+I*(1.77791674531872E+00):d := 6.79913247154588E-01+I*(-7.12687755503280E-02):e := 2.35183410758858E-01+I*(2.23098601908198E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.91947784223516E-01+I*(-7.91957415947961E-01):b := 3.46719981233586E-01+I*(-1.09300050179496E+00):c := -8.65405078194264E-01+I*(1.68753149399156E+00):d := 7.24267425902740E-01+I*(-1.34915216524468E-01):e := 2.91314531705113E-01+I*(2.24420617800142E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.03860092713836E-01+I*(-8.44573429859740E-01):b := 6.91084446151040E-01+I*(-1.01358740433048E+00):c := -1.02652789828150E+00+I*(1.43434382915152E+00):d := 7.99155841720690E-01+I*(-1.55160902419874E-01):e := 3.54390833556695E-01+I*(2.68621913875862E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.11168649939017E-01+I*(-6.71482678809882E-01):b := 9.09730357829967E-01+I*(-8.48235476670233E-01):c := -1.05082337241235E+00+I*(9.40307675686903E-01):d := 5.98009852416787E-01+I*(2.03486447175182E-02):e := 5.21029142096008E-01+I*(6.37697825665635E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13011211010863E-01+I*(-3.96908361595639E-01):b := 8.91321985542402E-01+I*(-4.95312742100031E-01):c := -8.29460881199529E-01+I*(7.37667096670583E-01):d := 6.30952197786784E-01+I*(9.05837107644834E-02):e := 2.38196490347526E-01+I*(7.25164233791712E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.14534169949499E-01+I*(-1.21109095274753E-01):b := 6.50365993286229E-01+I*(-2.36790916053118E-01):c := -5.29632521479574E-01+I*(7.24724473765669E-01):d := 6.11041268180270E-01+I*(1.65561824259704E-01):e := 1.08658660588625E-01+I*(5.64247465448564E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.38183971282062E-01+I*(2.68655782738157E-02):b := 2.99608367765674E-01+I*(-1.93635234086903E-01):c := -2.91631314986500E-01+I*(9.07535804070601E-01):d := 5.47593608845469E-01+I*(2.10199892609854E-01):e := 1.18060867486029E-01+I*(4.41038792673494E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26893585752287E-01+I*(-2.22233352586192E-02):b := 3.17250019858953E-03+I*(-3.86038719415358E-01):c := -2.26820671327192E-01+I*(1.20056163441408E+00):d := 4.70297084727321E-01+I*(2.03611267537029E-01):e := 1.62987930737849E-01+I*(3.67237774199291E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.16504236200602E-01+I*(-2.45406587667727E-01):b := -1.00235972462692E-01+I*(-7.23973642926746E-01):c := -3.65526210959912E-01+I*(1.46669192215904E+00):d := 4.15319598515884E-01+I*(1.48878839937214E-01):e := 2.21032619966561E-01+I*(3.21587310998198E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.18294991994591E-01+I*(-5.38254254745726E-01):b := 3.77689233972007E-02+I*(-1.04931649818176E+00):c := -6.42846070350148E-01+I*(1.58140134796092E+00):d := 4.08385727016189E-01+I*(7.16125209675403E-02):e := 2.93586978695065E-01+I*(2.96673103640350E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.31427938596213E-01+I*(-7.63739658427535E-01):b := 3.52613163251851E-01+I*(-1.20983574742351E+00):c := -9.29019205222281E-01+I*(1.49101609663376E+00):d := 4.52739905764340E-01+I*(7.96607999340044E-03):e := 3.90502709113760E-01+I*(3.02242367597941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43340247086533E-01+I*(-8.16355672339313E-01):b := 6.96977628169306E-01+I*(-1.13042264995904E+00):c := -1.09014202530952E+00+I*(1.23782843179372E+00):d := 5.27628321582291E-01+I*(-1.22796059020057E-02):e := 5.12886027221947E-01+I*(3.88316918731497E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.54012066863514E-01+I*(-5.24229701475530E-01):b := 1.00140146074191E+00+I*(-6.73191423458739E-01):c := -1.37173011956499E+00+I*(5.09677022845794E-01):d := 4.75524787460868E-01+I*(1.02685579388355E-01):e := 6.62565199317586E-01+I*(4.93435965917571E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.55854627935360E-01+I*(-2.49655384261287E-01):b := 9.82993088454339E-01+I*(-3.20268688888537E-01):c := -1.15036762835216E+00+I*(3.07036443829474E-01):d := 5.08467132830865E-01+I*(1.72920645435320E-01):e := 4.27765100012010E-01+I*(7.18834539957455E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.57377586873996E-01+I*(2.61438820595992E-02):b := 7.42037096198167E-01+I*(-6.17468628416237E-02):c := -8.50539268632210E-01+I*(2.94093820924560E-01):d := 4.88556203224351E-01+I*(2.47898758930541E-01):e := 2.12018930098624E-01+I*(5.94886276749746E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.65944564243518E-03+I*(1.74118555608168E-01):b := 3.91279470677612E-01+I*(-1.85911808754083E-02):c := -6.12538062139136E-01+I*(4.76905151229492E-01):d := 4.25108543889550E-01+I*(2.92536827280691E-01):e := 1.83277753133091E-01+I*(4.52530442921377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.84050168827789E-01+I*(1.25029642075733E-01):b := 9.48436031105275E-02+I*(-2.10994666203863E-01):c := -5.47727418479828E-01+I*(7.69930981572968E-01):d := 3.47812019771402E-01+I*(2.85948202207865E-01):e := 2.12552083876692E-01+I*(3.60793103975383E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.73660819276105E-01+I*(-9.81536103333743E-02):b := -8.56486955075473E-03+I*(-5.48929589715251E-01):c := -6.86432958112547E-01+I*(1.03606126931792E+00):d := 2.92834533559965E-01+I*(2.31215774608051E-01):e := 2.61503448422824E-01+I*(2.99524887980795E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.75451575070094E-01+I*(-3.91001277411374E-01):b := 1.29440026309138E-01+I*(-8.74272444970268E-01):c := -9.63752817502783E-01+I*(1.15077069511981E+00):d := 2.85900662060269E-01+I*(1.53949455638377E-01):e := 3.27128733387695E-01+I*(2.57440859224293E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.88584521671716E-01+I*(-6.16486681093182E-01):b := 4.44284266163789E-01+I*(-1.03479169421202E+00):c := -1.24992595237492E+00+I*(1.06038544379265E+00):d := 3.30254840808421E-01+I*(9.03030146642369E-02):e := 4.19621500203273E-01+I*(2.37760678617629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.96830162036550E-04+I*(-6.69102695004961E-01):b := 7.88648731081243E-01+I*(-9.55378596747541E-01):c := -1.41104877246215E+00+I*(8.07197778952608E-01):d := 4.05143256626371E-01+I*(7.00573287688308E-02):e := 5.54838028127661E-01+I*(2.77435871130823E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.71461796924030E-01+I*(-2.62767775516950E-01):b := 1.11748505678012E+00+I*(-6.87675999607905E-01):c := -1.18924670989304E+00+I*(4.12904796712825E-01):d := 2.87663919831183E-01+I*(-1.39905750837103E-01):e := 2.81299141093280E-01+I*(7.28598101766314E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73304357995876E-01+I*(1.18065416972934E-02):b := 1.09907668449255E+00+I*(-3.34753265037703E-01):c := -9.67884218680216E-01+I*(2.10264217696506E-01):d := 3.20606265201179E-01+I*(-6.96706847901374E-02):e := 4.50556121715964E-02+I*(6.64153492910352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.74827316934512E-01+I*(2.87605808018179E-01):b := 8.58120692236381E-01+I*(-7.62314389907899E-02):c := -6.68055858960261E-01+I*(1.97321594791592E-01):d := 3.00695335594665E-01+I*(5.30742870508290E-03):e := 5.68609930920012E-03+I*(5.09367273633975E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21091757029515E-02+I*(4.35580481566748E-01):b := 5.07363066715827E-01+I*(-3.30757570245742E-02):c := -4.30054652467188E-01+I*(3.80132925096523E-01):d := 2.37247676259864E-01+I*(4.99454970552330E-02):e := 4.56054580410364E-02+I*(4.16981253478800E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.66600438767273E-01+I*(3.86491568034313E-01):b := 2.10927199148742E-01+I*(-2.25479242353029E-01):c := -3.65244008807880E-01+I*(6.73158755439999E-01):d := 1.59951152141716E-01+I*(4.33568719824077E-02):e := 1.01967154691345E-01+I*(3.67089648975409E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56211089215589E-01+I*(1.63308315625206E-01):b := 1.07518726487460E-01+I*(-5.63414165864417E-01):c := -5.03949548440600E-01+I*(9.39289043184957E-01):d := 1.04973665930279E-01+I*(-1.13755556174067E-02):e := 1.65672445653817E-01+I*(3.42525987476297E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.58001845009578E-01+I*(-1.29539351452794E-01):b := 2.45523622347353E-01+I*(-8.88757021119434E-01):c := -7.81269407830835E-01+I*(1.05399846898684E+00):d := 9.80397944305837E-02+I*(-8.86418745870807E-02):e := 2.40537902178780E-01+I*(3.41593196245788E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.71134791611199E-01+I*(-3.55024755134602E-01):b := 5.60367862202003E-01+I*(-1.04927627036118E+00):c := -1.06744254270297E+00+I*(9.63613217659682E-01):d := 1.42393973178735E-01+I*(-1.52288315561221E-01):e := 3.31363453553210E-01+I*(3.82387350402733E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.69528998984799E-02+I*(-4.07640769046381E-01):b := 9.04732327119458E-01+I*(-9.69863172896707E-01):c := -1.22856536279020E+00+I*(7.10425552819639E-01):d := 2.17282388996686E-01+I*(-1.72534001456627E-01):e := 4.06925424288034E-01+I*(5.20533506077096E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.16764579259860E-01+I*(-5.12598497739193E-02):b := 1.21572075654271E+00+I*(-6.24154731456686E-01):c := -9.87252320032386E-01+I*(4.56071045345892E-01):d := 2.99688847390252E-01+I*(-4.46496129362480E-01):e := 1.01395345367729E-01+I*(5.10884225336625E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.18607140331707E-01+I*(2.23314467440324E-01):b := 1.19731238425514E+00+I*(-2.71231996886484E-01):c := -7.65889828819561E-01+I*(2.53430466329573E-01):d := 3.32631192760248E-01+I*(-3.76261063315515E-01):e := 2.98384231497766E-03+I*(4.57116087559833E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20130099270342E-01+I*(4.99113733761210E-01):b := 9.56356391998969E-01+I*(-1.27101708395705E-02):c := -4.66061469099606E-01+I*(2.40487843424659E-01):d := 3.12720263153735E-01+I*(-3.01282949820295E-01):e := -9.30700834126430E-03+I*(3.76882208551659E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32588041961219E-01+I*(6.47088407309779E-01):b := 6.05598766478414E-01+I*(3.04455111266453E-02):c := -2.28060262606532E-01+I*(4.23299173729590E-01):d := 2.49272603818933E-01+I*(-2.56644881470145E-01):e := 1.83060921981649E-02+I*(3.25918976066534E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.21297656431443E-01+I*(5.97999493777344E-01):b := 3.09162898911329E-01+I*(-1.61957974201810E-01):c := -1.63249618947224E-01+I*(7.16325004073067E-01):d := 1.71976079700786E-01+I*(-2.63233506542970E-01):e := 5.73119313446679E-02+I*(2.99820139375498E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.10908306879759E-01+I*(3.74816241368236E-01):b := 2.05754426250047E-01+I*(-4.99892897713198E-01):c := -3.01955158579944E-01+I*(9.82455291818024E-01):d := 1.16998593489348E-01+I*(-3.17965934142784E-01):e := 1.01159568282105E-01+I*(2.92358221910427E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.12699062673748E-01+I*(8.19685742902364E-02):b := 3.43759322109940E-01+I*(-8.25235752968215E-01):c := -5.79275017970180E-01+I*(1.09716471761991E+00):d := 1.10064721989653E-01+I*(-3.95232253112458E-01):e := 1.48933938814236E-01+I*(3.05302010979895E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.25832009275369E-01+I*(-1.43516829391572E-01):b := 6.58603561964590E-01+I*(-9.85755002209962E-01):c := -8.65448152842313E-01+I*(1.00677946629275E+00):d := 1.54418900737805E-01+I*(-4.58878694086598E-01):e := 1.94059664989596E-01+I*(3.50906176843258E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.37744317765690E-01+I*(-1.96132843303350E-01):b := 1.00296802688204E+00+I*(-9.06341904745487E-01):c := -1.02657097292955E+00+I*(7.53591801452706E-01):d := 2.29307316555755E-01+I*(-4.79124379982004E-01):e := 1.98656161645301E-01+I*(4.42379347841137E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.37695038715866E-01+I*(1.13271666496410E-02):b := 1.25014298434256E+00+I*(-5.12349926333295E-01):c := -8.60262369916406E-01+I*(6.18977801270167E-01):d := 5.05972972891004E-01+I*(-6.73628510703243E-01):e := 1.12747385987861E-01+I*(3.71094328161651E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.58524776440192E-02+I*(2.85901483863884E-01):b := 1.23173461205500E+00+I*(-1.59427191763093E-01):c := -6.38899878703581E-01+I*(4.16337222253848E-01):d := 5.38915318261000E-01+I*(-6.03393444656278E-01):e := 4.97999222284400E-02+I*(3.53828380135710E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.34329518705383E-01+I*(5.61700750184770E-01):b := 9.90778619798823E-01+I*(9.90946342838198E-02):c := -3.39071518983626E-01+I*(4.03394599348934E-01):d := 5.19004388654487E-01+I*(-5.28415331161057E-01):e := 2.93699004112653E-02+I*(3.06252022699852E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.87047659936944E-01+I*(7.09675423733338E-01):b := 6.40020994278268E-01+I*(1.42250316250036E-01):c := -1.01070312490552E-01+I*(5.86205929653865E-01):d := 4.55556729319686E-01+I*(-4.83777262810907E-01):e := 4.03607384178383E-02+I*(2.68477231673839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.75757274407168E-01+I*(6.60586510200904E-01):b := 3.43585126711184E-01+I*(-5.01531690784193E-02):c := -3.62596688312444E-02+I*(8.79231759997342E-01):d := 3.78260205201538E-01+I*(-4.90365887883732E-01):e := 6.42016319153931E-02+I*(2.46316523285426E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.65367924855484E-01+I*(4.37403257791797E-01):b := 2.40176654049901E-01+I*(-3.88088092589808E-01):c := -1.74965208463963E-01+I*(1.14536204774230E+00):d := 3.23282718990100E-01+I*(-5.45098315483547E-01):e := 9.36947990993772E-02+I*(2.37941892528717E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.67158680649473E-01+I*(1.44555590713797E-01):b := 3.78181549909794E-01+I*(-7.13430947844825E-01):c := -4.52285067854199E-01+I*(1.26007147354418E+00):d := 3.16348847490405E-01+I*(-6.22364634453221E-01):e := 1.26176021706513E-01+I*(2.44528640708280E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.80291627251095E-01+I*(-8.09298129680115E-02):b := 6.93025789764445E-01+I*(-8.73950197086572E-01):c := -7.38458202726333E-01+I*(1.16968622221702E+00):d := 3.60703026238557E-01+I*(-6.86011075427361E-01):e := 1.55830755435852E-01+I*(2.72356983818505E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.92203935741416E-01+I*(-1.33545826879790E-01):b := 1.03739025468190E+00+I*(-7.94537099622097E-01):c := -8.99581022813568E-01+I*(9.16498557376981E-01):d := 4.35591442056507E-01+I*(-7.06256761322767E-01):e := 1.61324821866369E-01+I*(3.25807030961920E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.72852573748660E-01+I*(-1.04291886808061E-01):b := 1.20464519723168E+00+I*(-4.04576295126968E-01):c := -8.67696868540457E-01+I*(8.25399182881762E-01):d := 8.09993661418953E-01+I*(-7.15025129334807E-01):e := 1.54577718333247E-01+I*(2.92454265703729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.71010012676814E-01+I*(1.70282430406182E-01):b := 1.18623682494412E+00+I*(-5.16535605567657E-02):c := -6.46334377327632E-01+I*(6.22758603865442E-01):d := 8.42936006788949E-01+I*(-6.44790063287842E-01):e := 1.05615898757910E-01+I*(2.98544946936728E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.69487053738178E-01+I*(4.46081696727068E-01):b := 9.45280832687944E-01+I*(2.06868265490147E-01):c := -3.46506017607677E-01+I*(6.09815980960528E-01):d := 8.23025077182436E-01+I*(-5.69811949792621E-01):e := 7.61106788636333E-02+I*(2.69067182807966E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.22205194969738E-01+I*(5.94056370275637E-01):b := 5.94523207167389E-01+I*(2.50023947456363E-01):c := -1.08504811114603E-01+I*(7.92627311265460E-01):d := 7.59577417847634E-01+I*(-5.25173881442472E-01):e := 7.43967780982606E-02+I*(2.36464103301253E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.10914809439963E-01+I*(5.44967456743202E-01):b := 2.98087339600304E-01+I*(5.76204621279081E-02):c := -4.36941674552950E-02+I*(1.08565314160894E+00):d := 6.82280893729486E-01+I*(-5.31762506515297E-01):e := 8.80081562263646E-02+I*(2.13224116638754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10052545988828E+00+I*(3.21784204334094E-01):b := 1.94678866939022E-01+I*(-2.80314461383480E-01):c := -1.82399707088015E-01+I*(1.35178342935389E+00):d := 6.27303407518050E-01+I*(-5.86494934115111E-01):e := 1.09327516743826E-01+I*(2.00526513078842E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10231621568227E+00+I*(2.89365372560944E-02):b := 3.32683762798915E-01+I*(-6.05657316638497E-01):c := -4.59719566478251E-01+I*(1.46649285515578E+00):d := 6.20369536018355E-01+I*(-6.63761253084785E-01):e := 1.35220027615338E-01+I*(1.99399715988357E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.15449162283890E-01+I*(-1.96548866425714E-01):b := 6.47528002653565E-01+I*(-7.66176565880245E-01):c := -7.45892701350384E-01+I*(1.37610760382862E+00):d := 6.64723714766506E-01+I*(-7.27407694058925E-01):e := 1.61856746321449E-01+I*(2.14182504345462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.27361470774210E-01+I*(-2.49164880337493E-01):b := 9.91892467571020E-01+I*(-6.86763468415770E-01):c := -9.07015521437620E-01+I*(1.12291993898858E+00):d := 7.39612130584457E-01+I*(-7.47653379954331E-01):e := 1.76365874221244E-01+I*(2.50050103494798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.78675201711792E-01+I*(-3.44017570071519E-01):b := 1.10051631545083E+00+I*(-3.51262317649636E-01):c := -1.00607713137310E+00+I*(9.78748331606494E-01):d := 1.06949625399828E+00+I*(-5.51316047327296E-01):e := 2.05421540215956E-01+I*(2.40560653037908E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76832640639946E-01+I*(-6.94432528572758E-02):b := 1.08210794316326E+00+I*(1.66041692056621E-03):c := -7.84714640160271E-01+I*(7.76107752590174E-01):d := 1.10243859936828E+00+I*(-4.81080981280331E-01):e := 1.65975967229137E-01+I*(2.65458803835764E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.75309681701310E-01+I*(2.06356013463610E-01):b := 8.41151950907090E-01+I*(2.60182242967479E-01):c := -4.84886280440316E-01+I*(7.63165129685260E-01):d := 1.08252766976177E+00+I*(-4.06102867785111E-01):e := 1.27370325025025E-01+I*(2.50425617862676E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.28027822932871E-01+I*(3.54330687012179E-01):b := 4.90394325386536E-01+I*(3.03337924933695E-01):c := -2.46885073947242E-01+I*(9.45976459990193E-01):d := 1.01908001042696E+00+I*(-3.61464799434961E-01):e := 1.13986229596933E-01+I*(2.20437198213916E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01673743740310E+00+I*(3.05241773479744E-01):b := 1.93958457819451E-01+I*(1.10934439605240E-01):c := -1.82074430287935E-01+I*(1.23900229033367E+00):d := 9.41783486308817E-01+I*(-3.68053424507786E-01):e := 1.19240354904569E-01+I*(1.94312609145760E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.20634808785141E+00+I*(8.20585210706364E-02):b := 9.05499851581690E-02+I*(-2.27000483906148E-01):c := -3.20779969920654E-01+I*(1.50513257807863E+00):d := 8.86806000097380E-01+I*(-4.22785852107600E-01):e := 1.34978614958679E-01+I*(1.76392282299293E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.20813884364540E+00+I*(-2.10789146007363E-01):b := 2.28554881018062E-01+I*(-5.52343339161166E-01):c := -5.98099829310890E-01+I*(1.61984200388051E+00):d := 8.79872128597684E-01+I*(-5.00052171077274E-01):e := 1.57574098270519E-01+I*(1.68017516156902E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02127179024702E+00+I*(-4.36274549689172E-01):b := 5.43399120872712E-01+I*(-7.12862588402913E-01):c := -8.84272964183023E-01+I*(1.52945675255335E+00):d := 9.24226307345836E-01+I*(-5.63698612051414E-01):e := 1.84576950557162E-01+I*(1.72882638636542E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.33184098737342E-01+I*(-4.88890563600951E-01):b := 8.87763585790167E-01+I*(-6.33449490938437E-01):c := -1.04539578427026E+00+I*(1.27626908771331E+00):d := 9.99114723163787E-01+I*(-5.83944297946820E-01):e := 2.07911153967853E-01+I*(1.97869376944472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.05647338893807E-01+I*(-5.95679571687560E-01):b := 9.86479400048877E-01+I*(-3.77354196481802E-01):c := -1.21065349550962E+00+I*(1.00727147647011E+00):d := 1.16305660351106E+00+I*(-2.59102563575807E-01):e := 2.69025232179279E-01+I*(2.02763438680205E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.03804777821960E-01+I*(-3.21105254473317E-01):b := 9.68071027761311E-01+I*(-2.44314619115999E-02):c := -9.89291004296794E-01+I*(8.04630897453794E-01):d := 1.19599894888106E+00+I*(-1.88867497528841E-01):e := 2.38940524561769E-01+I*(2.48438369106846E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.02281818883324E-01+I*(-4.53059881524310E-02):b := 7.27115035505139E-01+I*(2.34090364135313E-01):c := -6.89462644576839E-01+I*(7.91688274548880E-01):d := 1.17608801927454E+00+I*(-1.13889384033622E-01):e := 1.88256268541122E-01+I*(2.49072302888106E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.54999960114885E-01+I*(1.02668685396138E-01):b := 3.76357409984584E-01+I*(2.77246046101529E-01):c := -4.51461438083765E-01+I*(9.74499604853812E-01):d := 1.11264035993974E+00+I*(-6.92513156834714E-02):e := 1.60915767224901E-01+I*(2.19795678930912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.43709574585110E-01+I*(5.35797718637029E-02):b := 7.99215424174995E-02+I*(8.48425607730739E-02):c := -3.86650794424458E-01+I*(1.26752543519729E+00):d := 1.03534383582159E+00+I*(-7.58399407562967E-02):e := 1.57685476910917E-01+I*(1.88436543579028E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13332022503342E+00+I*(-1.69603480545404E-01):b := -2.34869302437826E-02+I*(-2.53092362738314E-01):c := -5.25356334057177E-01+I*(1.53365572294224E+00):d := 9.80366349610158E-01+I*(-1.30572368356111E-01):e := 1.68937356247662E-01+I*(1.63650920538558E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13511098082741E+00+I*(-4.62451147623404E-01):b := 1.14517965616110E-01+I*(-5.78435217993332E-01):c := -8.02676193447413E-01+I*(1.64836514874413E+00):d := 9.73432478110463E-01+I*(-2.07838687325785E-01):e := 1.89959425071130E-01+I*(1.47304085150009E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.48243927429036E-01+I*(-6.87936551305212E-01):b := 4.29362205470760E-01+I*(-7.38954467235079E-01):c := -1.08884932831955E+00+I*(1.55797989741697E+00):d := 1.01778665685861E+00+I*(-2.71485128299925E-01):e := 2.19220403520178E-01+I*(1.42726412323584E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.60156235919357E-01+I*(-7.40552565216992E-01):b := 7.73726670388215E-01+I*(-6.59541369770604E-01):c := -1.24997214840678E+00+I*(1.30479223257693E+00):d := 1.09267507267657E+00+I*(-2.91730814195331E-01):e := 2.52376734683830E-01+I*(1.58503825871438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.87939533921528E-01+I*(-7.41522444188439E-01):b := 9.15893591121542E-01+I*(-4.70643251538964E-01):c := -1.38570240655752E+00+I*(8.97622320991488E-01):d := 1.04689678261280E+00+I*(2.48853852812158E-02):e := 3.60703602767743E-01+I*(1.80515327608083E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.60969728496817E-02+I*(-4.66948126974196E-01):b := 8.97485218833976E-01+I*(-1.17720516968761E-01):c := -1.16433991534469E+00+I*(6.94981741975169E-01):d := 1.07983912798279E+00+I*(9.51204513281809E-02):e := 3.40862123101986E-01+I*(2.59439578529683E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84574013911046E-01+I*(-1.91148860653309E-01):b := 6.56529226577804E-01+I*(1.40801309078152E-01):c := -8.64511555624737E-01+I*(6.82039119070254E-01):d := 1.05992819837628E+00+I*(1.70098564823402E-01):e := 2.65831079418309E-01+I*(2.80818024393416E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.37292155142607E-01+I*(-4.31741871047408E-02):b := 3.05771601057249E-01+I*(1.83956991044367E-01):c := -6.26510349131663E-01+I*(8.64850449375187E-01):d := 9.96480539041480E-01+I*(2.14736633173551E-01):e := 2.17108264506901E-01+I*(2.46178476211991E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.26001769612831E-01+I*(-9.22631006371757E-02):b := 9.33573349016420E-03+I*(-8.44649428408763E-03):c := -5.61699705472355E-01+I*(1.15787627971866E+00):d := 9.19184014923332E-01+I*(2.08148008100726E-01):e := 2.04571403510131E-01+I*(2.03380026841758E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.15612420061147E-01+I*(-3.15446353046283E-01):b := -9.40727391711179E-02+I*(-3.46381417795476E-01):c := -7.00405245105075E-01+I*(1.42400656746362E+00):d := 8.64206528711895E-01+I*(1.53415580500912E-01):e := 2.13022045944342E-01+I*(1.67540875356994E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.17403175855136E-01+I*(-6.08294020124282E-01):b := 4.39321566887746E-02+I*(-6.71724273050493E-01):c := -9.77725104495309E-01+I*(1.53871599326550E+00):d := 8.57272657212199E-01+I*(7.61492615312375E-02):e := 2.35162950243044E-01+I*(1.40477982624395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.30536122456757E-01+I*(-8.33779423806091E-01):b := 3.58776396543425E-01+I*(-8.32243522292241E-01):c := -1.26389823936744E+00+I*(1.44833074193835E+00):d := 9.01626835960351E-01+I*(1.25028205570977E-02):e := 2.70214523323419E-01+I*(1.24792363870632E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.42448430947078E-01+I*(-8.86395437717870E-01):b := 7.03140861460880E-01+I*(-7.52830424827766E-01):c := -1.42502105945468E+00+I*(1.19514307709830E+00):d := 9.76515251778301E-01+I*(-7.74286533830820E-03):e := 3.18029157220023E-01+I*(1.31028323529639E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.25803117057748E-02+I*(-7.13304686668012E-01):b := 9.21786773139808E-01+I*(-5.87478497167515E-01):c := -1.44931653358553E+00+I*(7.01106923633688E-01):d := 7.75369262474399E-01+I*(1.67766681799084E-01):e := 5.12837246111322E-01+I*(2.12456417147908E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74422872777621E-01+I*(-4.38730369453769E-01):b := 9.03378400852242E-01+I*(-2.34555762597313E-01):c := -1.22795404237271E+00+I*(4.98466344617369E-01):d := 8.08311607844395E-01+I*(2.38001747846049E-01):e := 4.85026455568323E-01+I*(3.69416795956910E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.59458317162569E-02+I*(-1.62931103132883E-01):b := 6.62422408596069E-01+I*(2.39660634496001E-02):c := -9.28125682652753E-01+I*(4.85523721712455E-01):d := 7.88400678237882E-01+I*(3.12979861341269E-01):e := 3.37803600668197E-01+I*(4.02037618791628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.76772309515304E-01+I*(-1.49564295843139E-02):b := 3.11664783075515E-01+I*(6.71217454158156E-02):c := -6.90124476159680E-01+I*(6.68335052017387E-01):d := 7.24953018903081E-01+I*(3.57617929691419E-01):e := 2.60379889485134E-01+I*(3.32054365167055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.65481923985529E-01+I*(-6.40453431167488E-02):b := 1.52289155084299E-02+I*(-1.25281739912639E-01):c := -6.25313832500372E-01+I*(9.61360882360863E-01):d := 6.47656494784933E-01+I*(3.51029304618594E-01):e := 2.46584206577869E-01+I*(2.61904802215712E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.55092574433844E-01+I*(-2.87228595525857E-01):b := -8.81795571528523E-02+I*(-4.63216663424027E-01):c := -7.64019372133092E-01+I*(1.22749117010582E+00):d := 5.92679008573496E-01+I*(2.96296877018780E-01):e := 2.61585836015690E-01+I*(2.07373532418378E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.56883330227833E-01+I*(-5.80076262603856E-01):b := 4.98253387070404E-02+I*(-7.88559518679044E-01):c := -1.04133923152333E+00+I*(1.34220059590770E+00):d := 5.85745137073800E-01+I*(2.19030558049106E-01):e := 2.94281374992228E-01+I*(1.65549205279177E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70016276829455E-01+I*(-8.05561666285665E-01):b := 3.64669578561691E-01+I*(-9.49078767920792E-01):c := -1.32751236639546E+00+I*(1.25181534458055E+00):d := 6.30099315821952E-01+I*(1.55384117074966E-01):e := 3.46169665688192E-01+I*(1.37030733400187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.81928585319775E-01+I*(-8.58177680197443E-01):b := 7.09034043479146E-01+I*(-8.69665670456317E-01):c := -1.48863518648270E+00+I*(9.98627679740502E-01):d := 7.04987731639902E-01+I*(1.35138431179560E-01):e := 4.24339823227503E-01+I*(1.36609527448588E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.51334353254162E-01+I*(-5.81071323890050E-01):b := 8.43025855130309E-01+I*(-4.65690273927791E-01):c := -1.52323831165511E+00+I*(7.02921493986066E-02):d := 5.16631490290021E-01+I*(3.29618778756543E-01):e := 6.67882183163538E-01+I*(-2.01368307390344E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.53176914326008E-01+I*(-3.06497006675807E-01):b := 8.24617482842743E-01+I*(-1.12767539357589E-01):c := -1.30187582044229E+00+I*(-1.32348429617713E-01):d := 5.49573835660017E-01+I*(3.99853844803508E-01):e := 8.36429776235376E-01+I*(1.90792137222595E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.54699873264644E-01+I*(-3.06977403549206E-02):b := 5.83661490586570E-01+I*(1.45754286689324E-01):c := -1.00204746072233E+00+I*(-1.45291052522627E-01):d := 5.29662906053504E-01+I*(4.74831958298729E-01):e := 6.44356300433367E-01+I*(4.41142570402570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.98173203308350E-03+I*(1.17276933193648E-01):b := 2.32903865066015E-01+I*(1.88909968655539E-01):c := -7.64046254229258E-01+I*(3.75202777823050E-02):d := 4.66215246718703E-01+I*(5.19470026648879E-01):e := 4.38352166650914E-01+I*(3.82909576019334E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.86727882437141E-01+I*(6.81880196612133E-02):b := -6.35320025010691E-02+I*(-3.49351667291548E-03):c := -6.99235610569950E-01+I*(3.30546108125781E-01):d := 3.88918722600555E-01+I*(5.12881401576053E-01):e := 3.71152286919767E-01+I*(2.75483449688997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.76338532885456E-01+I*(-1.54995232747894E-01):b := -1.66940475162351E-01+I*(-3.41428440184304E-01):c := -8.37941150202670E-01+I*(5.96676395870739E-01):d := 3.33941236389118E-01+I*(4.58148973976239E-01):e := 3.62136521845442E-01+I*(1.87193791094964E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.78129288679446E-01+I*(-4.47842899825894E-01):b := -2.89355793024584E-02+I*(-6.66771295439321E-01):c := -1.11526100959291E+00+I*(7.11385821672620E-01):d := 3.27007364889422E-01+I*(3.80882655006565E-01):e := 3.80777789474587E-01+I*(1.13230870571685E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.91262235281067E-01+I*(-6.73328303507703E-01):b := 2.85908660552192E-01+I*(-8.27290544681069E-01):c := -1.40143414446504E+00+I*(6.21000570345464E-01):d := 3.71361543637574E-01+I*(3.17236214032425E-01):e := 4.24315832175064E-01+I*(4.62783319243296E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.17454377138788E-03+I*(-7.25944317419481E-01):b := 6.30273125469647E-01+I*(-7.47877447216593E-01):c := -1.56255696455227E+00+I*(3.67812905505421E-01):d := 4.46249959455524E-01+I*(2.96990528137019E-01):e := 5.08120711519726E-01+I*(-1.21825101539984E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.68784083314678E-01+I*(-3.19609397931470E-01):b := 9.59109451168523E-01+I*(-4.80174850076957E-01):c := -1.34075490198316E+00+I*(-2.64800767343616E-02):d := 3.28770622660336E-01+I*(8.70274485310850E-02):e := 8.54308359799987E-01+I*(3.69307529246238E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.70626644386524E-01+I*(-4.50350807172265E-02):b := 9.40701078880957E-01+I*(-1.27252115506755E-01):c := -1.11939241077034E+00+I*(-2.29120655750681E-01):d := 3.61712968030332E-01+I*(1.57262514578050E-01):e := 6.76336731142481E-01+I*(7.88465865034444E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.72149603325160E-01+I*(2.30764185603660E-01):b := 6.99745086624785E-01+I*(1.31269710540158E-01):c := -8.19564051050384E-01+I*(-2.42063278655595E-01):d := 3.41802038423818E-01+I*(2.32240628073271E-01):e := 3.16749298807887E-01+I*(6.91914353052361E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.94314620935995E-02+I*(3.78738859152228E-01):b := 3.48987461104230E-01+I*(1.74425392506373E-01):c := -5.81562844557310E-01+I*(-5.92519483506636E-02):d := 2.78354379089017E-01+I*(2.76878696423421E-01):e := 2.46578605042648E-01+I*(5.03591634188611E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69278152376625E-01+I*(3.29649945619794E-01):b := 5.25515935371454E-02+I*(-1.79780928220813E-02):c := -5.16752200898002E-01+I*(2.33773881992813E-01):d := 2.01057854970869E-01+I*(2.70290071350595E-01):e := 2.66419907051239E-01+I*(3.82167421923561E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.58888802824941E-01+I*(1.06466693210686E-01):b := -5.08568791241368E-02+I*(-3.55913016333470E-01):c := -6.55457740530722E-01+I*(4.99904169737770E-01):d := 1.46080368759432E-01+I*(2.15557643750781E-01):e := 3.12617661194142E-01+I*(2.99212211791504E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.60679558618930E-01+I*(-1.86380973867313E-01):b := 8.71480167357562E-02+I*(-6.81255871588487E-01):c := -9.32777599920958E-01+I*(6.14613595539652E-01):d := 1.39146497259737E-01+I*(1.38291324781107E-01):e := 3.77940402197575E-01+I*(2.36105655039325E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.73812505220552E-01+I*(-4.11866377549122E-01):b := 4.01992256590406E-01+I*(-8.41775120830235E-01):c := -1.21895073479309E+00+I*(5.24228344212496E-01):d := 1.83500676007889E-01+I*(7.46448838069669E-02):e := 4.74241820398357E-01+I*(1.89101220746108E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42751862891281E-02+I*(-4.64482391460901E-01):b := 7.46356721507861E-01+I*(-7.62362023365759E-01):c := -1.38007355488033E+00+I*(2.71040679372452E-01):d := 2.58389091825839E-01+I*(5.43991979115612E-02):e := 6.32605263739150E-01+I*(1.84187254514440E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.14086865650508E-01+I*(-1.08101472188439E-01):b := 1.05734515093111E+00+I*(-4.16653581925738E-01):c := -1.13876051212251E+00+I*(1.66861718987051E-02):d := 3.40795550219405E-01+I*(-2.19562929994293E-01):e := 4.38169944575574E-01+I*(5.43590882003197E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.15929426722355E-01+I*(1.66472845025804E-01):b := 1.03893677864354E+00+I*(-6.37308473555358E-02):c := -9.17398020909683E-01+I*(-1.85954407117614E-01):d := 3.73737895589401E-01+I*(-1.49327863947328E-01):e := 2.33927772730741E-01+I*(6.15624296697633E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.17452385660990E-01+I*(4.42272111346690E-01):b := 7.97980786387372E-01+I*(1.94790978691377E-01):c := -6.17569661189728E-01+I*(-1.98897030022528E-01):d := 3.53826965982887E-01+I*(-7.43497504521074E-02):e := 1.22257365417956E-01+I*(5.01063305127875E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.35265755570571E-01+I*(5.90246784895259E-01):b := 4.47223160866817E-01+I*(2.37946660657593E-01):c := -3.79568454696654E-01+I*(-1.60856997175965E-02):d := 2.90379306648086E-01+I*(-2.97116821019573E-02):e := 1.21577035837964E-01+I*(3.99599725112585E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23975370040795E-01+I*(5.41157871362824E-01):b := 1.50787293299733E-01+I*(4.55431753291380E-02):c := -3.14757811037346E-01+I*(2.76940130625880E-01):d := 2.13082782529938E-01+I*(-3.63003071747826E-02):e := 1.56171785884911E-01+I*(3.35534121180175E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.13586020489110E-01+I*(3.17974618953716E-01):b := 4.73788206384506E-02+I*(-2.92391748182250E-01):c := -4.53463350670066E-01+I*(5.43070418370837E-01):d := 1.58105296318501E-01+I*(-9.10327347745969E-02):e := 2.04623871868944E-01+I*(2.95752715641241E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.15376776283099E-01+I*(2.51269518757170E-02):b := 1.85383716498343E-01+I*(-6.17734603437267E-01):c := -7.30783210060302E-01+I*(6.57779844172719E-01):d := 1.51171424818806E-01+I*(-1.68299053744271E-01):e := 2.66133904552974E-01+I*(2.75210210709549E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.28509722884721E-01+I*(-2.00358451806092E-01):b := 5.00227956352994E-01+I*(-7.78253852679015E-01):c := -1.01695634493244E+00+I*(5.67394592845562E-01):d := 1.95525603566958E-01+I*(-2.31945494718411E-01):e := 3.46413604229923E-01+I*(2.82860553065072E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.40422031375042E-01+I*(-2.52974465717870E-01):b := 8.44592421270448E-01+I*(-6.98840755214540E-01):c := -1.17807916501967E+00+I*(3.14206928005519E-01):d := 2.70414019384908E-01+I*(-2.52191180613817E-01):e := 4.39711447006909E-01+I*(3.57281016256949E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.40372752325217E-01+I*(-4.55144557648792E-02):b := 1.09176737873096E+00+I*(-3.04848776802348E-01):c := -1.01177056200653E+00+I*(1.79592927822981E-01):d := 5.47079675720157E-01+I*(-4.46695311335055E-01):e := 2.82565030837940E-01+I*(3.76621461023480E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.85301912533705E-02+I*(2.29059861449364E-01):b := 1.07335900644340E+00+I*(4.80739577678546E-02):c := -7.90408070793703E-01+I*(-2.30476511933394E-02):d := 5.80022021090153E-01+I*(-3.76460245288090E-01):e := 1.88673875540597E-01+I*(4.13005283836678E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.37007232314735E-01+I*(5.04859127770250E-01):b := 8.32403014187226E-01+I*(3.06595783814767E-01):c := -4.90579711073748E-01+I*(-3.59902740982532E-02):d := 5.60111091483639E-01+I*(-3.01482131792869E-01):e := 1.23102481653177E-01+I*(3.63605242202269E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.89725373546296E-01+I*(6.52833801318819E-01):b := 4.81645388666672E-01+I*(3.49751465780983E-01):c := -2.52578504580674E-01+I*(1.46821056206679E-01):d := 4.96663432148838E-01+I*(-2.56844063442719E-01):e := 1.13965321363054E-01+I*(3.05382894784591E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.78434988016520E-01+I*(6.03744887786384E-01):b := 1.85209521099587E-01+I*(1.57347980452528E-01):c := -1.87767860921366E-01+I*(4.39846886550155E-01):d := 4.19366908030691E-01+I*(-2.63432688515545E-01):e := 1.31823086273548E-01+I*(2.63781345707154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.68045638464836E-01+I*(3.80561635377276E-01):b := 8.18010484383051E-02+I*(-1.80586943058860E-01):c := -3.26473400554086E-01+I*(7.05977174295112E-01):d := 3.64389421819254E-01+I*(-3.18165116115359E-01):e := 1.62174283959281E-01+I*(2.37767195524247E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.69836394258825E-01+I*(8.77139682992770E-02):b := 2.19805944298198E-01+I*(-5.05929798313877E-01):c := -6.03793259944322E-01+I*(8.20686600096994E-01):d := 3.57455550319558E-01+I*(-3.95431435085033E-01):e := 2.01765969365448E-01+I*(2.26618770820202E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.82969340860447E-01+I*(-1.37771435382532E-01):b := 5.34650184152848E-01+I*(-6.66449047555625E-01):c := -8.89966394816456E-01+I*(7.30301348769838E-01):d := 4.01809729067710E-01+I*(-4.59077876059173E-01):e := 2.49891785893494E-01+I*(2.36882936249801E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.94881649350767E-01+I*(-1.90387449294310E-01):b := 8.79014649070303E-01+I*(-5.87035950091150E-01):c := -1.05108921490369E+00+I*(4.77113683929794E-01):d := 4.76698144885660E-01+I*(-4.79323561954579E-01):e := 2.94547996386569E-01+I*(2.86317913071952E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.75530287358012E-01+I*(-1.61133509222581E-01):b := 1.04626959162009E+00+I*(-1.97075145596020E-01):c := -1.01920506063058E+00+I*(3.86014309434575E-01):d := 8.51100364248106E-01+I*(-4.88091929966620E-01):e := 2.62488606595516E-01+I*(2.57995350248949E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.73687726286165E-01+I*(1.13440807991662E-01):b := 1.02786121933252E+00+I*(1.55847588974182E-01):c := -7.97842569417753E-01+I*(1.83373730418255E-01):d := 8.84042709618102E-01+I*(-4.17856863919654E-01):e := 2.14143723144187E-01+I*(2.99711325356352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.72164767347530E-01+I*(3.89240074312548E-01):b := 7.86905227076347E-01+I*(4.14369415021095E-01):c := -4.98014209697798E-01+I*(1.70431107513341E-01):d := 8.64131780011589E-01+I*(-3.42878750424434E-01):e := 1.59569045850864E-01+I*(2.84648206948100E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.24882908579090E-01+I*(5.37214747861117E-01):b := 4.36147601555792E-01+I*(4.57525096987310E-01):c := -2.60013003204724E-01+I*(3.53242437818273E-01):d := 8.00684120676787E-01+I*(-2.98240682074284E-01):e := 1.38872656074498E-01+I*(2.46416428744064E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.13592523049315E-01+I*(4.88125834328682E-01):b := 1.39711733988708E-01+I*(2.65121611658855E-01):c := -1.95202359545417E-01+I*(6.46268268161750E-01):d := 7.23387596558639E-01+I*(-3.04829307147110E-01):e := 1.42981798363582E-01+I*(2.12538362526419E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10320317349763E+00+I*(2.64942581919575E-01):b := 3.63032613274257E-02+I*(-7.28133118525327E-02):c := -3.33907899178136E-01+I*(9.12398555906707E-01):d := 6.68410110347203E-01+I*(-3.59561734746924E-01):e := 1.60482540445595E-01+I*(1.88351107442739E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10499392929162E+00+I*(-2.79050851584249E-02):b := 1.74308157187319E-01+I*(-3.98156167107550E-01):c := -6.11227758568372E-01+I*(1.02710798170859E+00):d := 6.61476238847507E-01+I*(-4.36828053716598E-01):e := 1.87033287558637E-01+I*(1.74748597581474E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.18126875893242E-01+I*(-2.53390488840233E-01):b := 4.89152397041969E-01+I*(-5.58675416349298E-01):c := -8.97400893440506E-01+I*(9.36722730381432E-01):d := 7.05830417595659E-01+I*(-5.00474494690738E-01):e := 2.21069920718653E-01+I*(1.75818713655989E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.30039184383562E-01+I*(-3.06006502752012E-01):b := 8.33516861959423E-01+I*(-4.79262318884822E-01):c := -1.05852371352774E+00+I*(6.83535065541389E-01):d := 7.80718833413610E-01+I*(-5.20720180586144E-01):e := 2.55663060381945E-01+I*(2.01932577082428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.81352915321144E-01+I*(-4.00859192486039E-01):b := 9.42140709839232E-01+I*(-1.43761168118689E-01):c := -1.15758532346322E+00+I*(5.39363458159307E-01):d := 1.11060295682744E+00+I*(-3.24382847959109E-01):e := 2.76549626674049E-01+I*(1.75490755097163E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.79510354249298E-01+I*(-1.26284875271795E-01):b := 9.23732337551666E-01+I*(2.09161566451514E-01):c := -9.36222832250393E-01+I*(3.36722879142988E-01):d := 1.14354530219743E+00+I*(-2.54147781912144E-01):e := 2.55409218538292E-01+I*(2.23376102063391E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.77987395310662E-01+I*(1.49514391049090E-01):b := 6.82776345295494E-01+I*(4.67683392498426E-01):c := -6.36394472530438E-01+I*(3.23780256238074E-01):d := 1.12363437259092E+00+I*(-1.79169668416923E-01):e := 2.06534753524972E-01+I*(2.32196543406018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.30705536542222E-01+I*(2.97489064597659E-01):b := 3.32018719774939E-01+I*(5.10839074464642E-01):c := -3.98393266037364E-01+I*(5.06591586543006E-01):d := 1.06018671325612E+00+I*(-1.34531600066774E-01):e := 1.75368641699706E-01+I*(2.07499350371714E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01941515101245E+00+I*(2.48400151065224E-01):b := 3.55828522078545E-02+I*(3.18435589136188E-01):c := -3.33582622378057E-01+I*(7.99617416886482E-01):d := 9.82890189137970E-01+I*(-1.41120225139599E-01):e := 1.68097190896774E-01+I*(1.77111300642452E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.20902580146076E+00+I*(2.52168986561174E-02):b := -6.78256204534274E-02+I*(-1.94993343752008E-02):c := -4.72288162010776E-01+I*(1.06574770463144E+00):d := 9.27912702926532E-01+I*(-1.95852652739413E-01):e := 1.76120897873484E-01+I*(1.51616688393997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.21081655725475E+00+I*(-2.67630768421883E-01):b := 7.01792754064655E-02+I*(-3.44842189630218E-01):c := -7.49608021401012E-01+I*(1.18045713043332E+00):d := 9.20978831426837E-01+I*(-2.73118971709087E-01):e := 1.94518921106673E-01+I*(1.33496270995452E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02394950385637E+00+I*(-4.93116172103691E-01):b := 3.85023515261116E-01+I*(-5.05361438871965E-01):c := -1.03578115627315E+00+I*(1.09007187910616E+00):d := 9.65333010174989E-01+I*(-3.36765412683227E-01):e := 2.21793429535469E-01+I*(1.25817729768364E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.35861812346694E-01+I*(-5.45732186015470E-01):b := 7.29387980178570E-01+I*(-4.25948341407490E-01):c := -1.19690397636038E+00+I*(8.36884214266121E-01):d := 1.04022142599294E+00+I*(-3.57011098578633E-01):e := 2.54814989454123E-01+I*(1.36547524690287E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.08325052503158E-01+I*(-6.52521194102080E-01):b := 8.28103794437281E-01+I*(-1.69853046950855E-01):c := -1.36216168759974E+00+I*(5.67886603022927E-01):d := 1.20416330634021E+00+I*(-3.21693642076194E-02):e := 3.07325310721374E-01+I*(1.08103109415869E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.06482491431312E-01+I*(-3.77946876887837E-01):b := 8.09695422149715E-01+I*(1.83069687619347E-01):c := -1.14079919638692E+00+I*(3.65246024006608E-01):d := 1.23710565171021E+00+I*(3.80657018393458E-02):e := 3.09967674966183E-01+I*(1.61682286460559E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.04959532492676E-01+I*(-1.02147610566951E-01):b := 5.68739429893542E-01+I*(4.41591513666260E-01):c := -8.40970836666961E-01+I*(3.52303401101693E-01):d := 1.21719472210370E+00+I*(1.13043815334566E-01):e := 2.66205697295638E-01+I*(1.93671446292898E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.57677673724237E-01+I*(4.58270629816180E-02):b := 2.17981804372988E-01+I*(4.84747195632476E-01):c := -6.02969630173887E-01+I*(5.35114731406625E-01):d := 1.15374706276890E+00+I*(1.57681883684716E-01):e := 2.23186254662761E-01+I*(1.81782119885628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.46387288194462E-01+I*(-3.26185055081669E-03):b := -7.84540631940968E-02+I*(2.92343710304021E-01):c := -5.38158986514580E-01+I*(8.28140561750102E-01):d := 1.07645053865075E+00+I*(1.51093258611891E-01):e := 2.03996713280863E-01+I*(1.53022900740738E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13599793864278E+00+I*(-2.26445102959924E-01):b := -1.81862535855379E-01+I*(-4.55912132073669E-02):c := -6.76864526147300E-01+I*(1.09427084949506E+00):d := 1.02147305243931E+00+I*(9.63608310120767E-02):e := 2.03291894462108E-01+I*(1.24404956382249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13778869443677E+00+I*(-5.19292770037924E-01):b := -4.38576399954862E-02+I*(-3.70934068462384E-01):c := -9.54184385537535E-01+I*(1.20898027529694E+00):d := 1.01453918093962E+00+I*(1.90945120424026E-02):e := 2.15301318642134E-01+I*(1.00584702402652E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.50921641038388E-01+I*(-7.44778173719733E-01):b := 2.70986599859164E-01+I*(-5.31453317704132E-01):c := -1.24035752040967E+00+I*(1.11859502396978E+00):d := 1.05889335968777E+00+I*(-4.45519289317376E-02):e := 2.38415312354308E-01+I*(8.42515370229077E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.62833949528709E-01+I*(-7.97394187631511E-01):b := 6.15351064776619E-01+I*(-4.52040220239657E-01):c := -1.40148034049690E+00+I*(8.65407359129742E-01):d := 1.13378177550572E+00+I*(-6.47976148271435E-02):e := 2.72219210086373E-01+I*(8.21918857627794E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.90617247530880E-01+I*(-7.98364066602958E-01):b := 7.57517985509946E-01+I*(-2.63142102008016E-01):c := -1.53721059864764E+00+I*(4.58237447544301E-01):d := 1.08800348544195E+00+I*(2.51818584649403E-01):e := 3.59108500752567E-01+I*(4.47132428193483E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.87746864590337E-02+I*(-5.23789749388715E-01):b := 7.39109613222380E-01+I*(8.97806325621859E-02):c := -1.31584810743481E+00+I*(2.55596868527982E-01):d := 1.12094583081195E+00+I*(3.22053650696368E-01):e := 3.90977351238654E-01+I*(1.05963081383404E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.87251727520398E-01+I*(-2.47990483067829E-01):b := 4.98153620966208E-01+I*(3.48302458609099E-01):c := -1.01601974771486E+00+I*(2.42654245623068E-01):d := 1.10103490120543E+00+I*(3.97031764191589E-01):e := 3.52374670214556E-01+I*(1.69836548310953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.39969868751959E-01+I*(-1.00015809519260E-01):b := 1.47395995445652E-01+I*(3.91458140575314E-01):c := -7.78018541221785E-01+I*(4.25465575928000E-01):d := 1.03758724187063E+00+I*(4.41669832541739E-01):e := 2.90197548428870E-01+I*(1.73284866482050E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.28679483222184E-01+I*(-1.49104723051695E-01):b := -1.49039872121432E-01+I*(1.99054655246860E-01):c := -7.13207897562477E-01+I*(7.18491406271476E-01):d := 9.60290717752485E-01+I*(4.35081207468913E-01):e := 2.54778994135410E-01+I*(1.43122348697632E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.18290133670498E-01+I*(-3.72287975460802E-01):b := -2.52448344782714E-01+I*(-1.38880268264528E-01):c := -8.51913437195197E-01+I*(9.84621694016433E-01):d := 9.05313231541047E-01+I*(3.80348779869099E-01):e := 2.44281711923692E-01+I*(1.07896892707847E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.20080889464488E-01+I*(-6.65135642538802E-01):b := -1.14443448922821E-01+I*(-4.64223123519546E-01):c := -1.12923329658543E+00+I*(1.09933111981832E+00):d := 8.98379360041352E-01+I*(3.03082460899425E-01):e := 2.50488044976916E-01+I*(7.55780937899635E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.33213836066110E-01+I*(-8.90621046220611E-01):b := 2.00400790931829E-01+I*(-6.24742372761293E-01):c := -1.41540643145757E+00+I*(1.00894586849116E+00):d := 9.42733538789504E-01+I*(2.39436019925286E-01):e := 2.70999518558217E-01+I*(4.85525440223700E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.45126144556430E-01+I*(-9.43237060132389E-01):b := 5.44765255849283E-01+I*(-5.45329275296818E-01):c := -1.57652925154480E+00+I*(7.55758203651115E-01):d := 1.01762195460745E+00+I*(2.19190334029879E-01):e := 3.07786823201036E-01+I*(3.25086475586876E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.99025980964225E-02+I*(-7.70146309082532E-01):b := 7.63411167528211E-01+I*(-3.79977347636568E-01):c := -1.60082472567566E+00+I*(2.61722050186502E-01):d := 8.16475965303552E-01+I*(3.94699881167271E-01):e := 4.56162038474123E-01+I*(-1.63836757810226E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71745159168269E-01+I*(-4.95571991868288E-01):b := 7.45002795240645E-01+I*(-2.70546130663652E-02):c := -1.37946223446283E+00+I*(5.90814711701820E-02):d := 8.49418310673548E-01+I*(4.64934947214236E-01):e := 5.38290593478602E-01+I*(6.63900398090332E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.32681181069048E-02+I*(-2.19772725547402E-01):b := 5.04046802984473E-01+I*(2.31467212980548E-01):c := -1.07963387474288E+00+I*(4.61388482652680E-02):d := 8.29507381067035E-01+I*(5.39913060709456E-01):e := 4.94539925168595E-01+I*(1.94943206643336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.79450023124656E-01+I*(-7.17980519988336E-02):b := 1.53289177463918E-01+I*(2.74622894946763E-01):c := -8.41632668249802E-01+I*(2.28950178570200E-01):d := 7.66059721732233E-01+I*(5.84551129059606E-01):e := 3.85704941884766E-01+I*(2.12851268865511E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.68159637594881E-01+I*(-1.20886965531268E-01):b := -1.43146690103166E-01+I*(8.22194096183086E-02):c := -7.76822024590494E-01+I*(5.21976008913677E-01):d := 6.88763197614086E-01+I*(5.77962503986781E-01):e := 3.24715610954412E-01+I*(1.67775975920810E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.57770288043196E-01+I*(-3.44070217940376E-01):b := -2.46555162764448E-01+I*(-2.55715513893080E-01):c := -9.15527564223214E-01+I*(7.88106296658634E-01):d := 6.33785711402649E-01+I*(5.23230076386967E-01):e := 3.04100339969507E-01+I*(1.15696197510977E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.59561043837185E-01+I*(-6.36917885018375E-01):b := -1.08550266904556E-01+I*(-5.81058369148097E-01):c := -1.19284742361345E+00+I*(9.02815722460515E-01):d := 6.26851839902953E-01+I*(4.45963757417293E-01):e := 3.07039309416782E-01+I*(6.76059345894112E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.72693990438807E-01+I*(-8.62403288700184E-01):b := 2.06293972950095E-01+I*(-7.41577618389845E-01):c := -1.47902055848558E+00+I*(8.12430471133359E-01):d := 6.71206018651105E-01+I*(3.82317316443153E-01):e := 3.29100729861317E-01+I*(2.40072180037372E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84606298929128E-01+I*(-9.15019302611963E-01):b := 5.50658437867549E-01+I*(-6.62164520925369E-01):c := -1.64014337857282E+00+I*(5.59242806293316E-01):d := 7.46094434469055E-01+I*(3.62071630547747E-01):e := 3.75541438202098E-01+I*(-1.13903175654874E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.85820196225988E-01+I*(-6.26335734008941E-01):b := 5.88323934611736E-01+I*(-4.08537048352545E-01):c := -1.35686916775721E+00+I*(-3.63683779937684E-01):d := 4.02251202786841E-01+I*(5.29882574345400E-01):e := 4.81744536905369E-01+I*(-3.33084416739055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.87662757297834E-01+I*(-3.51761416794697E-01):b := 5.69915562324170E-01+I*(-5.56143137823430E-02):c := -1.13550667654439E+00+I*(-5.66324358954004E-01):d := 4.35193548156837E-01+I*(6.00117640392365E-01):e := 6.80130148357565E-01+I*(-4.33948038242499E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.89185716236470E-01+I*(-7.59621504738111E-02):b := 3.28959570067997E-01+I*(2.02907512264570E-01):c := -8.35678316824433E-01+I*(-5.79266981858918E-01):d := 4.15282618550324E-01+I*(6.75095753887586E-01):e := 9.92406178447808E-01+I*(-2.08220582486957E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64675750049091E-02+I*(7.20125230747574E-02):b := -2.17980554525577E-02+I*(2.46063194230785E-01):c := -5.97677110331359E-01+I*(-3.96455651553986E-01):d := 3.51834959215522E-01+I*(7.19733822237736E-01):e := 8.08293773244398E-01+I*(1.37373891498491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.52242039465316E-01+I*(2.29236095423229E-02):b := -3.18233923019642E-01+I*(5.36597089023309E-02):c := -5.32866466672051E-01+I*(-1.03429821210510E-01):d := 2.74538435097375E-01+I*(7.13145197164910E-01):e := 5.79363544853273E-01+I*(1.27973189818485E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.41852689913631E-01+I*(-2.00259642866785E-01):b := -4.21642395680924E-01+I*(-2.84275214609057E-01):c := -6.71572006304771E-01+I*(1.62700466534448E-01):d := 2.19560948885938E-01+I*(6.58412769565096E-01):e := 4.74635578745966E-01+I*(4.55846071392464E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.43643445707620E-01+I*(-4.93107309944784E-01):b := -2.83637499821031E-01+I*(-6.09618069864075E-01):c := -9.48891865695006E-01+I*(2.77409892336329E-01):d := 2.12627077386242E-01+I*(5.81146450595422E-01):e := 4.27340483819516E-01+I*(-3.83691756891505E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.56776392309242E-01+I*(-7.18592713626593E-01):b := 3.12067400336186E-02+I*(-7.70137319105822E-01):c := -1.23506500056714E+00+I*(1.87024641009173E-01):d := 2.56981256134394E-01+I*(5.17500009621282E-01):e := 4.09954409836545E-01+I*(-1.23105069412307E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13112992004374E-02+I*(-7.71208727538372E-01):b := 3.75571204951073E-01+I*(-6.90724221641347E-01):c := -1.39618782065438E+00+I*(-6.61630238308701E-02):d := 3.31869671952345E-01+I*(4.97254323725876E-01):e := 4.20114641248569E-01+I*(-2.17982896432181E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03269926286504E-01+I*(-3.64873808050360E-01):b := 7.04407530649950E-01+I*(-4.23021624501711E-01):c := -1.17438575808527E+00+I*(-4.60456006070652E-01):d := 2.14390335157155E-01+I*(2.87291244119942E-01):e := 8.52017682784556E-01+I*(-4.75734160750844E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.05112487358350E-01+I*(-9.02994908361171E-02):b := 6.85999158362384E-01+I*(-7.00988899315090E-02):c := -9.53023266872440E-01+I*(-6.63096585086972E-01):d := 2.47332680527152E-01+I*(3.57526310166907E-01):e := 1.64884710967069E+00+I*(-6.01501949281375E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.06635446296986E-01+I*(1.85499775484769E-01):b := 4.45043166106211E-01+I*(1.88422936115404E-01):c := -6.53194907152485E-01+I*(-6.76039207991887E-01):d := 2.27421750920638E-01+I*(4.32504423662128E-01):e := 1.62792689874218E+00+I*(9.61180530495075E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.39173050654252E-02+I*(3.33474449033338E-01):b := 9.42855405856566E-02+I*(2.31578618081619E-01):c := -4.15193700659411E-01+I*(-4.93227877686955E-01):d := 1.63974091585837E-01+I*(4.77142492012278E-01):e := 7.39634282088413E-01+I*(7.21520772724041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.34792309404799E-01+I*(2.84385535500903E-01):b := -2.02150326981428E-01+I*(3.91751327531651E-02):c := -3.50383057000103E-01+I*(-2.00202047343478E-01):d := 8.66775674676889E-02+I*(4.70553866939452E-01):e := 5.71518589448540E-01+I*(4.20043433572966E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.24402959853115E-01+I*(6.12022830917955E-02):b := -3.05558799642710E-01+I*(-2.98759790758223E-01):c := -4.89088596632823E-01+I*(6.59282404014788E-02):d := 3.17000812562517E-02+I*(4.15821439339638E-01):e := 5.36457264095969E-01+I*(2.28439701651490E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26193715647104E-01+I*(-2.31645383986204E-01):b := -1.67553903782817E-01+I*(-6.24102646013240E-01):c := -7.66408456023058E-01+I*(1.80637666203361E-01):d := 2.47662097565565E-02+I*(3.38555120369964E-01):e := 5.40583876240945E-01+I*(7.84816475462017E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.39326662248726E-01+I*(-4.57130787668013E-01):b := 1.47290336071833E-01+I*(-7.84621895254988E-01):c := -1.05258159089519E+00+I*(9.02524148762042E-02):d := 6.91203885047083E-02+I*(2.74908679395824E-01):e := 5.71065284332049E-01+I*(-6.62551517471187E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.87610292609537E-02+I*(-5.09746801579791E-01):b := 4.91654800989288E-01+I*(-7.05208797790513E-01):c := -1.21370441098243E+00+I*(-1.62935249963839E-01):d := 1.44008804322659E-01+I*(2.54662993500418E-01):e := 6.45166921053200E-01+I*(-2.36973947805385E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.48572708622334E-01+I*(-1.53365882307329E-01):b := 8.02643230412537E-01+I*(-3.59500356350492E-01):c := -9.72391368224609E-01+I*(-4.17289757437586E-01):d := 2.26415262716224E-01+I*(-1.92991344054359E-02):e := 1.17417255655633E+00+I*(2.75125042231500E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.50415269694180E-01+I*(1.21208434906914E-01):b := 7.84234858124972E-01+I*(-6.57762178028957E-03):c := -7.51028877011784E-01+I*(-6.19930336453905E-01):d := 2.59357608086221E-01+I*(5.09359316415292E-02):e := 1.00842872524626E+00+I*(1.11119362835217E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.51938228632816E-01+I*(3.97007701227800E-01):b := 5.43278865868799E-01+I*(2.51944204266623E-01):c := -4.51200517291829E-01+I*(-6.32872959358819E-01):d := 2.39446678479707E-01+I*(1.25914045136750E-01):e := 3.49676672170760E-01+I*(9.09776963682396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00779912598745E-01+I*(5.44982374776368E-01):b := 1.92521240348244E-01+I*(2.95099886232839E-01):c := -2.13199310798755E-01+I*(-4.50061629053888E-01):d := 1.75999019144906E-01+I*(1.70552113486900E-01):e := 2.71650322510364E-01+I*(6.12323139012840E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.89489527068969E-01+I*(4.95893461243934E-01):b := -1.03914627218841E-01+I*(1.02696400904384E-01):c := -1.48388667139447E-01+I*(-1.57035798710411E-01):d := 9.87024950267580E-02+I*(1.63963488414075E-01):e := 3.06500766556221E-01+I*(4.45347437806859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.79100177517285E-01+I*(2.72710208834826E-01):b := -2.07323099880123E-01+I*(-2.35238522607004E-01):c := -2.87094206772167E-01+I*(1.09094489034546E-01):d := 4.37250088153208E-02+I*(1.09231060814260E-01):e := 3.65937989001762E-01+I*(3.34057238502222E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.80890933311274E-01+I*(-2.01374582431735E-02):b := -6.93182040202298E-02+I*(-5.60581377862021E-01):c := -5.64414066162403E-01+I*(2.23803914836427E-01):d := 3.67911373156254E-02+I*(3.19647418445864E-02):e := 4.44516363997680E-01+I*(2.45366830297084E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.94023879912895E-01+I*(-2.45622861924982E-01):b := 2.45526035834421E-01+I*(-7.21100627103769E-01):c := -8.50587201034536E-01+I*(1.33418663509271E-01):d := 8.11453160637771E-02+I*(-3.16816991295537E-02):e := 5.59973002148805E-01+I*(1.66678615613830E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05936188403216E-01+I*(-2.98238875836760E-01):b := 5.89890500751875E-01+I*(-6.41687529639294E-01):c := -1.01171002112177E+00+I*(-1.19769001330772E-01):d := 1.56033731881727E-01+I*(-5.19273850249598E-02):e := 7.65859534628323E-01+I*(1.12102007092844E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05886909353391E-01+I*(-9.07788658837694E-02):b := 8.37065458212391E-01+I*(-2.47695551227101E-01):c := -8.45401418108629E-01+I*(-2.54383001513310E-01):d := 4.32699388216977E-01+I*(-2.46431515746198E-01):e := 5.92376095542854E-01+I*(3.87018670937082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.04434828154509E-03+I*(1.83795451330474E-01):b := 8.18657085924826E-01+I*(1.05227183343101E-01):c := -6.24038926895803E-01+I*(-4.57023580529630E-01):d := 4.65641733586973E-01+I*(-1.76196449699233E-01):e := 4.47887446920179E-01+I*(5.85827065020242E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02521389342909E-01+I*(4.59594717651360E-01):b := 5.77701093668653E-01+I*(3.63749009390014E-01):c := -3.24210567175849E-01+I*(-4.69966203434544E-01):d := 4.45730803980459E-01+I*(-1.01218336204012E-01):e := 2.53920980782437E-01+I*(5.26190598127889E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.55239530574470E-01+I*(6.07569391199929E-01):b := 2.26943468148098E-01+I*(4.06904691356229E-01):c := -8.62093606827749E-02+I*(-2.87154873129612E-01):d := 3.82283144645658E-01+I*(-5.65802678538623E-02):e := 2.06178022134135E-01+I*(4.09427312089423E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.43949145044695E-01+I*(5.58480477667494E-01):b := -6.94923994189862E-02+I*(2.14501206027775E-01):c := -2.13987170234670E-02+I*(5.87095721386394E-03):d := 3.04986620527510E-01+I*(-6.31688929266876E-02):e := 2.20139036624109E-01+I*(3.25704038778262E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.33559795493010E-01+I*(3.35297225258386E-01):b := -1.72900872080268E-01+I*(-1.23433717483614E-01):c := -1.60104256656187E-01+I*(2.72001244958821E-01):d := 2.50009134316073E-01+I*(-1.17901320526502E-01):e := 2.56920490471702E-01+I*(2.67680516472892E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.35350551286999E-01+I*(4.24495581803867E-02):b := -3.48959762203755E-02+I*(-4.48776572738631E-01):c := -4.37424116046422E-01+I*(3.86710670760703E-01):d := 2.43075262816378E-01+I*(-1.95167639496176E-01):e := 3.10282989677479E-01+I*(2.26881282805276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.48483497888621E-01+I*(-1.83035845501422E-01):b := 2.79948263634275E-01+I*(-6.09295821980379E-01):c := -7.23597250918556E-01+I*(2.96325419433546E-01):d := 2.87429441564530E-01+I*(-2.58814080470316E-01):e := 3.86654241437339E-01+I*(2.05594560213954E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.60395806378942E-01+I*(-2.35651859413200E-01):b := 6.24312728551729E-01+I*(-5.29882724515903E-01):c := -8.84720071005791E-01+I*(4.31377545935035E-02):d := 3.62317857382480E-01+I*(-2.79059766365722E-01):e := 4.96672991698394E-01+I*(2.31478478502472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.41044444386186E-01+I*(-2.06397919341472E-01):b := 7.91567671101512E-01+I*(-1.39921920020774E-01):c := -8.52835916732680E-01+I*(-4.79616199017160E-02):d := 7.36720076744926E-01+I*(-2.87828134377762E-01):e := 4.22836929654851E-01+I*(2.24134482802615E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.39201883314340E-01+I*(6.81763978727718E-02):b := 7.73159298813946E-01+I*(2.13000814549428E-01):c := -6.31473425519854E-01+I*(-2.50602198918036E-01):d := 7.69662422114922E-01+I*(-2.17593068330797E-01):e := 3.85526578731766E-01+I*(3.32683108583315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.37678924375704E-01+I*(3.43975664193658E-01):b := 5.32203306557774E-01+I*(4.71522640596341E-01):c := -3.31645065799899E-01+I*(-2.63544821822950E-01):d := 7.49751492508409E-01+I*(-1.42614954835577E-01):e := 2.79598128546713E-01+I*(3.47198071167429E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.90397065607265E-01+I*(4.91950337742227E-01):b := 1.81445681037219E-01+I*(5.14678322562556E-01):c := -9.36438593068254E-02+I*(-8.07334915180179E-02):d := 6.86303833173607E-01+I*(-9.79768864854272E-02):e := 2.23909630717957E-01+I*(2.93327205704636E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.79106680077490E-01+I*(4.42861424209792E-01):b := -1.14990186529865E-01+I*(3.22274837234102E-01):c := -2.88332156475175E-02+I*(2.12292338825459E-01):d := 6.09007309055460E-01+I*(-1.04565511558253E-01):e := 2.15019038377806E-01+I*(2.38258646868296E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06871733052581E+00+I*(2.19678171800684E-01):b := -2.18398659191148E-01+I*(-1.56600862772864E-02):c := -1.67538755280237E-01+I*(4.78422626570416E-01):d := 5.54029822844023E-01+I*(-1.59297939158067E-01):e := 2.29505500423629E-01+I*(1.95091793182661E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.07050808631979E+00+I*(-7.31694952773158E-02):b := -8.03937633312548E-02+I*(-3.41002941532304E-01):c := -4.44858614670473E-01+I*(5.93132052372297E-01):d := 5.47095951344327E-01+I*(-2.36564258127740E-01):e := 2.59038921868612E-01+I*(1.63236459727856E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.83641032921416E-01+I*(-2.98654898959124E-01):b := 2.34450476523396E-01+I*(-5.01522190774051E-01):c := -7.31031749542607E-01+I*(5.02746801045141E-01):d := 5.91450130092479E-01+I*(-3.00210699101881E-01):e := 3.04071620884121E-01+I*(1.45008838007182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.95553341411736E-01+I*(-3.51270912870903E-01):b := 5.78814941440850E-01+I*(-4.22109093309576E-01):c := -8.92154569629842E-01+I*(2.49559136205098E-01):d := 6.66338545910429E-01+I*(-3.20456384997286E-01):e := 3.66461618295267E-01+I*(1.54443101953110E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.46867072349318E-01+I*(-4.46123602604929E-01):b := 6.87438789320659E-01+I*(-8.66079425434424E-02):c := -9.91216179565319E-01+I*(1.05387528823017E-01):d := 9.96222669324256E-01+I*(-1.24119052370252E-01):e := 3.71868952143815E-01+I*(1.06180009358567E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.45024511277472E-01+I*(-1.71549285390686E-01):b := 6.69030417033093E-01+I*(2.66314792026760E-01):c := -7.69853688352494E-01+I*(-9.72530501933033E-02):d := 1.02916501469425E+00+I*(-5.38839863232866E-02):e := 3.83053287882588E-01+I*(1.82667244777237E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.43501552338836E-01+I*(1.04249980930200E-01):b := 4.28074424776921E-01+I*(5.24836618073673E-01):c := -4.70025328632539E-01+I*(-1.10195673098217E-01):d := 1.00925408508774E+00+I*(2.10941271719336E-02):e := 3.21035855120913E-01+I*(2.31853114629449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.96219693570397E-01+I*(2.52224654478769E-01):b := 7.73167992563658E-02+I*(5.67992300039888E-01):c := -2.32024122139465E-01+I*(7.26156572067146E-02):d := 9.45806425752937E-01+I*(6.57321955220837E-02):e := 2.60389940145770E-01+I*(2.14898067912362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.84929308040622E-01+I*(2.03135740946334E-01):b := -2.19119068310719E-01+I*(3.75588814711434E-01):c := -1.67213478480157E-01+I*(3.65641487550191E-01):d := 8.68509901634789E-01+I*(5.91435704492585E-02):e := 2.34735031589452E-01+I*(1.75938606426709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.17453995848894E+00+I*(-2.00475114627733E-02):b := -3.22527540972001E-01+I*(3.76538912000455E-02):c := -3.05919018112877E-01+I*(6.31771775295148E-01):d := 8.13532415423352E-01+I*(4.41114284944400E-03):e := 2.33293123101460E-01+I*(1.38481490134484E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.17633071428293E+00+I*(-3.12895178540773E-01):b := -1.84522645112108E-01+I*(-2.87688964054972E-01):c := -5.83238877503113E-01+I*(7.46481201097030E-01):d := 8.06598543923657E-01+I*(-7.28551761202299E-02):e := 2.47495429846495E-01+I*(1.07085683758881E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.89463660884547E-01+I*(-5.38380582222581E-01):b := 1.30321594742542E-01+I*(-4.48208213296720E-01):c := -8.69412012375246E-01+I*(6.56095949769873E-01):d := 8.50952722671808E-01+I*(-1.36501617094370E-01):e := 2.75766024897687E-01+I*(8.38269633717941E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.01375969374868E-01+I*(-5.90996596134360E-01):b := 4.74686059659997E-01+I*(-3.68795115832244E-01):c := -1.03053483246248E+00+I*(4.02908284929831E-01):d := 9.25841138489758E-01+I*(-1.56747302989776E-01):e := 3.19811133195478E-01+I*(7.65506521350590E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.73839209531332E-01+I*(-6.97785604220970E-01):b := 5.73401873918707E-01+I*(-1.12699821375609E-01):c := -1.19579254370184E+00+I*(1.33910673686636E-01):d := 1.08978301883703E+00+I*(1.68094431381237E-01):e := 3.56231706020234E-01+I*(1.17661309734378E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.71996648459486E-01+I*(-4.23211287006727E-01):b := 5.54993501631142E-01+I*(2.40222913194594E-01):c := -9.74430052489018E-01+I*(-6.87299053296836E-02):d := 1.12272536420703E+00+I*(2.38329497428203E-01):e := 3.98553463342042E-01+I*(6.47146996416255E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70473689520850E-01+I*(-1.47412020685841E-01):b := 3.14037509374969E-01+I*(4.98744739241506E-01):c := -6.74601692769062E-01+I*(-8.16725282345977E-02):d := 1.10281443460052E+00+I*(3.13307610923423E-01):e := 3.73352629257964E-01+I*(1.35952689862380E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.23191830752411E-01+I*(5.62652862727713E-04):b := -3.67201161455856E-02+I*(5.41900421207722E-01):c := -4.36600486275989E-01+I*(1.01138802070334E-01):d := 1.03936677526572E+00+I*(3.57945679273573E-01):e := 3.10556360102650E-01+I*(1.51332342698422E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.11901445222636E-01+I*(-4.85262606697070E-02):b := -3.33155983712670E-01+I*(3.49496935879268E-01):c := -3.71789842616681E-01+I*(3.94164632413811E-01):d := 9.62070251147568E-01+I*(3.51357054200748E-01):e := 2.69234517678972E-01+I*(1.26169989756003E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10151209567095E+00+I*(-2.71709513078815E-01):b := -4.36564456373952E-01+I*(1.15620123678791E-02):c := -5.10495382249400E-01+I*(6.60294920158768E-01):d := 9.07092764936130E-01+I*(2.96624626600934E-01):e := 2.53449111337151E-01+I*(9.18745627763436E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10330285146494E+00+I*(-5.64557180156814E-01):b := -2.98559560514060E-01+I*(-3.13780842887138E-01):c := -7.87815241639636E-01+I*(7.75004345960649E-01):d := 9.00158893436435E-01+I*(2.19358307631260E-01):e := 2.55258741770526E-01+I*(5.86671509763047E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.16435798066562E-01+I*(-7.90042583838624E-01):b := 1.62846793405910E-02+I*(-4.74300092128886E-01):c := -1.07398837651177E+00+I*(6.84619094633493E-01):d := 9.44513072184587E-01+I*(1.55711866657120E-01):e := 2.71782418903052E-01+I*(2.92716103698465E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.28348106556883E-01+I*(-8.42658597750402E-01):b := 3.60649144258045E-01+I*(-3.94886994664410E-01):c := -1.23511119659901E+00+I*(4.31431429793450E-01):d := 1.01940148800254E+00+I*(1.35466180761714E-01):e := 3.05101087694421E-01+I*(8.43658281923461E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.56131404559054E-01+I*(-8.43628476721849E-01):b := 5.02816064991372E-01+I*(-2.05988876432770E-01):c := -1.37084145474974E+00+I*(2.42615182080106E-02):d := 9.73623197938771E-01+I*(4.52082380238260E-01):e := 3.59771038318754E-01+I*(-7.93325458408736E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.42888434872078E-02+I*(-5.69054159507605E-01):b := 4.84407692703807E-01+I*(1.46933858137432E-01):c := -1.14947896353691E+00+I*(-1.78379060808309E-01):d := 1.00656554330877E+00+I*(5.22317446285225E-01):e := 4.30026659508619E-01+I*(-5.25841961763376E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52765884548572E-01+I*(-2.93254893186719E-01):b := 2.43451700447634E-01+I*(4.05455684184345E-01):c := -8.49650603816960E-01+I*(-1.91321683713223E-01):d := 9.86654613702254E-01+I*(5.97295559780446E-01):e := 4.49089159103062E-01+I*(3.73721593601803E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.05484025780133E-01+I*(-1.45280219638151E-01):b := -1.07305925072921E-01+I*(4.48611366150561E-01):c := -6.11649397323886E-01+I*(-8.51035340829120E-03):d := 9.23206954367452E-01+I*(6.41933628130596E-01):e := 3.85909375837645E-01+I*(9.31239352232616E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.94193640250357E-01+I*(-1.94369133170585E-01):b := -4.03741792640005E-01+I*(2.56207880822106E-01):c := -5.46838753664578E-01+I*(2.84515476935185E-01):d := 8.45910430249305E-01+I*(6.35345003057771E-01):e := 3.23989747003038E-01+I*(8.40285785782430E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.83804290698673E-01+I*(-4.17552385579693E-01):b := -5.07150265301288E-01+I*(-8.17270426892821E-02):c := -6.85544293297298E-01+I*(5.50645764680142E-01):d := 7.90932944037868E-01+I*(5.80612575457956E-01):e := 2.90931117297364E-01+I*(5.12274045995402E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.85595046492662E-01+I*(-7.10400052657693E-01):b := -3.69145369441395E-01+I*(-4.07069897944299E-01):c := -9.62864152687533E-01+I*(6.65355190482023E-01):d := 7.83999072538172E-01+I*(5.03346256488283E-01):e := 2.79604201416353E-01+I*(1.39590578208352E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.98727993094284E-01+I*(-9.35885456339501E-01):b := -5.43011295867443E-02+I*(-5.67589147186047E-01):c := -1.24903728755967E+00+I*(5.74969939154867E-01):d := 8.28353251286324E-01+I*(4.39699815514142E-01):e := 2.85131272967544E-01+I*(-2.33564800149093E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.10640301584604E-01+I*(-9.88501470251279E-01):b := 2.90063335330710E-01+I*(-4.88176049721572E-01):c := -1.41016010764690E+00+I*(3.21782274314825E-01):d := 9.03241667104274E-01+I*(4.19454129618736E-01):e := 3.09418778196819E-01+I*(-5.81387472534610E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04388441068248E-01+I*(-8.15410719201423E-01):b := 5.08709247009638E-01+I*(-3.22824122061321E-01):c := -1.43445558177776E+00+I*(-1.72253879149788E-01):d := 7.02095677800373E-01+I*(5.94963676756127E-01):e := 3.87761330724579E-01+I*(-1.85677677869984E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.06231002140094E-01+I*(-5.40836401987179E-01):b := 4.90300874722072E-01+I*(3.00986125088812E-02):c := -1.21309309056493E+00+I*(-3.74894458166109E-01):d := 7.35038023170368E-01+I*(6.65198742803093E-01):e := 4.94938449510128E-01+I*(-1.99363563285881E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07753961078730E-01+I*(-2.65037135666293E-01):b := 2.49344882465900E-01+I*(2.88620438555794E-01):c := -9.13264730844976E-01+I*(-3.87837081071023E-01):d := 7.15127093563855E-01+I*(7.40176856298313E-01):e := 5.90938791634461E-01+I*(-8.40954735184588E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.44964180152831E-01+I*(-1.17062462117724E-01):b := -1.01412743054655E-01+I*(3.31776120522010E-01):c := -6.75263524351903E-01+I*(-2.05025750766091E-01):d := 6.51679434229054E-01+I*(7.84814924648463E-01):e := 5.23203290884503E-01+I*(4.71426844833388E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.33673794623055E-01+I*(-1.66151375650159E-01):b := -3.97848610621740E-01+I*(1.39372635193555E-01):c := -6.10452880692595E-01+I*(8.80000795773855E-02):d := 5.74382910110905E-01+I*(7.78226299575638E-01):e := 4.19154471808629E-01+I*(5.91293432060422E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.23284445071371E-01+I*(-3.89334628059266E-01):b := -5.01257083283022E-01+I*(-1.98562288317833E-01):c := -7.49158420325314E-01+I*(3.54130367322343E-01):d := 5.19405423899469E-01+I*(7.23493871975823E-01):e := 3.58279576810081E-01+I*(2.15096662568974E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.25075200865360E-01+I*(-6.82182295137266E-01):b := -3.63252187423129E-01+I*(-5.23905143572850E-01):c := -1.02647827971555E+00+I*(4.68839793124224E-01):d := 5.12471552399773E-01+I*(6.46227553006150E-01):e := 3.29573091238680E-01+I*(-2.64501796392224E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.38208147466982E-01+I*(-9.07667698819075E-01):b := -4.84079475684786E-02+I*(-6.84424392814598E-01):c := -1.31265141458768E+00+I*(3.78454541797068E-01):d := 5.56825731147925E-01+I*(5.82581112032009E-01):e := 3.22499017210644E-01+I*(-7.76197931364522E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.50120455957303E-01+I*(-9.60283712730853E-01):b := 2.95956517348976E-01+I*(-6.05011295350123E-01):c := -1.47377423467492E+00+I*(1.25266876957025E-01):d := 6.31714146965876E-01+I*(5.62335426136604E-01):e := 3.37459832876230E-01+I*(-1.32233839944674E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41333286585021E-01+I*(-6.38843211279689E-01):b := 3.56473558493362E-01+I*(-5.28474376167007E-01):c := -9.50468659288197E-01+I*(-5.89188604721417E-01):d := 1.85903732669364E-01+I*(6.09771310514730E-01):e := 2.32754849401560E-01+I*(-5.10611330486158E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.43175847656868E-01+I*(-3.64268894065446E-01):b := 3.38065186205797E-01+I*(-1.75551641596805E-01):c := -7.29106168075371E-01+I*(-7.91829183737737E-01):d := 2.18846078039359E-01+I*(6.80006376561696E-01):e := 2.02041565571901E-01+I*(-7.00959315916953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.44698806595504E-01+I*(-8.84696277445603E-02):b := 9.71091939496246E-02+I*(8.29701844501082E-02):c := -4.29277808355416E-01+I*(-8.04771806642652E-01):d := 1.98935148432846E-01+I*(7.54984490056916E-01):e := 3.66834358733622E-01+I*(-1.04337659024370E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.19806653639428E-02+I*(5.95050458040083E-02):b := -2.53648431570930E-01+I*(1.26125866416324E-01):c := -1.91276601862343E-01+I*(-6.21960476337720E-01):d := 1.35487489098045E-01+I*(7.99622558407066E-01):e := 1.10171323770004E+00+I*(-9.14968888326794E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.96728949106282E-01+I*(1.04161322715739E-02):b := -5.50084299138015E-01+I*(-6.62776189121307E-02):c := -1.26465958203035E-01+I*(-3.28934645994244E-01):d := 5.81909649798970E-02+I*(7.93033933334241E-01):e := 9.39445946954816E-01+I*(-2.74956931933017E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.86339599554597E-01+I*(-2.12767120137534E-01):b := -6.53492771799297E-01+I*(-4.04212542423519E-01):c := -2.65171497835754E-01+I*(-6.28043582492862E-02):d := 3.21347876845991E-03+I*(7.38301505734426E-01):e := 6.39093389007881E-01+I*(-2.02187351580279E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.88130355348587E-01+I*(-5.05614787215533E-01):b := -5.15487875939405E-01+I*(-7.29555397678536E-01):c := -5.42491357225990E-01+I*(5.19050675525956E-02):d := -3.72039273123524E-03+I*(6.61035186764752E-01):e := 4.75841995312366E-01+I*(-2.46790900845540E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.01263301950208E-01+I*(-7.31100190897342E-01):b := -2.00643636084754E-01+I*(-8.90074646920284E-01):c := -8.28664492098124E-01+I*(-3.84801837745610E-02):d := 4.06337860169162E-02+I*(5.97388745790612E-01):e := 3.72510111104694E-01+I*(-3.13308849807348E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.68243895594711E-02+I*(-7.83716204809121E-01):b := 1.43720828832700E-01+I*(-8.10661549455809E-01):c := -9.89787312185359E-01+I*(-2.91667848614604E-01):d := 1.15522201834867E-01+I*(5.77143059895207E-01):e := 2.95126908941498E-01+I*(-3.95953245250368E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.58783016645538E-01+I*(-3.77381285321109E-01):b := 4.72557154531577E-01+I*(-5.42958952316173E-01):c := -7.67985249616249E-01+I*(-6.85960830854387E-01):d := -1.95713496032251E-03+I*(3.67179980289273E-01):e := 1.66847710692100E-01+I*(-8.36222706470738E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.60625577717384E-01+I*(-1.02806968106866E-01):b := 4.54148782244011E-01+I*(-1.90036217745971E-01):c := -5.46622758403423E-01+I*(-8.88601409870706E-01):d := 3.09852104096737E-02+I*(4.37415046336238E-01):e := -1.77569465187218E-01+I*(-1.15509332506632E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.62148536656020E-01+I*(1.72992298214020E-01):b := 2.13192789987839E-01+I*(6.84856083009422E-02):c := -2.46794398683468E-01+I*(-9.01544032775620E-01):d := 1.10742808031604E-02+I*(5.12393159831458E-01):e := -1.10650818685072E+00+I*(-2.01254203253025E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09430395424459E-01+I*(3.20966971762588E-01):b := -1.37564835532716E-01+I*(1.11641290267158E-01):c := -8.79319219039467E-03+I*(-7.18732702470689E-01):d := -5.23733785316409E-02+I*(5.57031228181608E-01):e := 1.96808189701282E+01+I*(1.81192681566959E+01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.79279219045766E-01+I*(2.71878058230154E-01):b := -4.34000703099801E-01+I*(-8.07621950612967E-02):c := 5.60174514689134E-02+I*(-4.25706872127212E-01):d := -1.29669902649789E-01+I*(5.50442603108783E-01):e := 1.84134681512605E+00+I*(7.21516514808644E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.68889869494081E-01+I*(4.86948058210464E-02):b := -5.37409175761083E-01+I*(-4.18697118572685E-01):c := -8.26880881638061E-02+I*(-1.59576584382255E-01):d := -1.84647388861226E-01+I*(4.95710175508969E-01):e := 1.09506579058015E+00+I*(2.57429431074847E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70680625288070E-01+I*(-2.44152861256953E-01):b := -3.99404279901190E-01+I*(-7.44039973827702E-01):c := -3.60007947554042E-01+I*(-4.48671585803734E-02):d := -1.91581260360921E-01+I*(4.18443856539295E-01):e := 7.82865799631941E-01+I*(-2.64597111987277E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.83813571889692E-01+I*(-4.69638264938762E-01):b := -8.45600400465397E-02+I*(-9.04559223069450E-01):c := -6.46181082426176E-01+I*(-1.35252409907530E-01):d := -1.47227081612770E-01+I*(3.54797415565155E-01):e := 5.73377566327457E-01+I*(-4.59176240534954E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04274119619988E-01+I*(-5.22254278850541E-01):b := 2.59804424870915E-01+I*(-8.25146125604975E-01):c := -8.07303902513411E-01+I*(-3.88440074747573E-01):d := -7.23386657948193E-02+I*(3.34551729669749E-01):e := 3.85284896395242E-01+I*(-6.33717896098165E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.04085798981367E-01+I*(-1.65873359578078E-01):b := 5.70792854294164E-01+I*(-4.79437684164954E-01):c := -5.65990859755592E-01+I*(-6.42794582221319E-01):d := 1.00677925987467E-02+I*(6.05896017638944E-02):e := 6.09765406880727E-01+I*(-1.97993719407590E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.05928360053214E-01+I*(1.08700957636165E-01):b := 5.52384482006599E-01+I*(-1.26514949594751E-01):c := -3.44628368542767E-01+I*(-8.45435161237639E-01):d := 4.30101379687429E-02+I*(1.30824667810860E-01):e := -3.02326465551629E+00+I*(-2.18303655952763E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.07451318991850E-01+I*(3.84500223957051E-01):b := 3.11428489750426E-01+I*(1.32006876452162E-01):c := -4.48000088228120E-02+I*(-8.58377784142553E-01):d := 2.30992083622297E-02+I*(2.05802781306080E-01):e := -1.62665831704570E+00+I*(1.68158999477731E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.52668222397112E-02+I*(5.32474897505619E-01):b := -3.93291357701287E-02+I*(1.75162558418377E-01):c := 1.93201197670262E-01+I*(-6.75566453837621E-01):d := -4.03484509725717E-02+I*(2.50440849656230E-01):e := -1.16644164022569E-01+I*(1.39062848139491E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.33976436709936E-01+I*(4.83385983973185E-01):b := -3.35765003337214E-01+I*(-1.72409269100773E-02):c := 2.58011841329570E-01+I*(-3.82540623494145E-01):d := -1.17644975090720E-01+I*(2.43852224583405E-01):e := 4.21533998581315E-01+I*(9.60092045883328E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.23587087158251E-01+I*(2.60202731564077E-01):b := -4.39173475998495E-01+I*(-3.55175850421466E-01):c := 1.19306301696850E-01+I*(-1.16410335749188E-01):d := -1.72622461302157E-01+I*(1.89119796983591E-01):e := 6.96151332646699E-01+I*(5.99083113462336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.25377842952240E-01+I*(-3.26449355139224E-02):b := -3.01168580138603E-01+I*(-6.80518705676483E-01):c := -1.58013557693386E-01+I*(-1.70090994730622E-03):d := -1.79556332801852E-01+I*(1.11853478013917E-01):e := 8.73574852406619E-01+I*(2.48534984664908E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.38510789553862E-01+I*(-2.58130339195731E-01):b := 1.36756597160477E-02+I*(-8.41037954918231E-01):c := -4.44186692565519E-01+I*(-9.20861612744627E-02):d := -1.35202154053701E-01+I*(4.82070370397767E-02):e := 9.97837316475402E-01+I*(-1.65959321020045E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04230980441824E-02+I*(-3.10746353107510E-01):b := 3.58040124633503E-01+I*(-7.61624857453756E-01):c := -6.05309512652755E-01+I*(-3.45273826114506E-01):d := -6.03137382357502E-02+I*(2.79613511443706E-02):e := 1.03810921952098E+00+I*(-7.84623769324315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.03738189943576E-02+I*(-1.03286343154519E-01):b := 6.05215082094019E-01+I*(-3.67632879041563E-01):c := -4.39000909639613E-01+I*(-4.79887826297044E-01):d := 2.16351918099499E-01+I*(-1.66542779576867E-01):e := 1.82876879297316E+00+I*(4.32547998225807E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.14687420774887E-02+I*(1.71287974059725E-01):b := 5.86806709806453E-01+I*(-1.47101444713612E-02):c := -2.17638418426787E-01+I*(-6.82528405313364E-01):d := 2.49294263469495E-01+I*(-9.63077135299022E-02):e := 7.64141499743475E-01+I*(2.05944617832331E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70082989838754E-02+I*(4.47087240380611E-01):b := 3.45850717550281E-01+I*(2.43811681575552E-01):c := 8.21899412931679E-02+I*(-6.95471028218278E-01):d := 2.29383333862982E-01+I*(-2.13296000346818E-02):e := 9.82425575066369E-02+I*(1.11366196248600E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.99726440215436E-01+I*(5.95061913929180E-01):b := -4.90690797027436E-03+I*(2.86967363541767E-01):c := 3.20191147786242E-01+I*(-5.12659697913346E-01):d := 1.65935674528181E-01+I*(2.33084683154683E-02):e := 1.77037403940851E-01+I*(7.27404914161387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.88436054685661E-01+I*(5.45973000396745E-01):b := -3.01342775537359E-01+I*(9.45638782133128E-02):c := 3.85001791445550E-01+I*(-2.19633867569870E-01):d := 8.86391504100326E-02+I*(1.67198432426429E-02):e := 2.81250383201450E-01+I*(5.39784959192859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.78046705133976E-01+I*(3.22789747987637E-01):b := -4.04751248198641E-01+I*(-2.43371045298076E-01):c := 2.46296251812830E-01+I*(4.64964201750876E-02):d := 3.36616641985956E-02+I*(-3.80125843571715E-02):e := 3.85325591034908E-01+I*(4.15144934770832E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.79837460927966E-01+I*(2.99420809096375E-02):b := -2.66746352338748E-01+I*(-5.68713900553093E-01):c := -3.10236075774057E-02+I*(1.61205845976969E-01):d := 2.67277926989003E-02+I*(-1.15278903326845E-01):e := 5.04854313840900E-01+I*(3.11434455112859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.92970407529587E-01+I*(-1.95543322772172E-01):b := 4.80978875159023E-02+I*(-7.29233149794841E-01):c := -3.17196742449539E-01+I*(7.08205946498127E-02):d := 7.10819714470519E-02+I*(-1.78925344300985E-01):e := 6.74519137041843E-01+I*(2.10500518211342E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.04882716019908E-01+I*(-2.48159336683950E-01):b := 3.92462352433357E-01+I*(-6.49820052330365E-01):c := -4.78319562536775E-01+I*(-1.82367070190230E-01):d := 1.45970387265002E-01+I*(-1.99171030196391E-01):e := 9.96504642360441E-01+I*(1.21360655176916E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.85531354027152E-01+I*(-2.18905396612221E-01):b := 5.59717294983139E-01+I*(-2.59859247835236E-01):c := -4.46435408263663E-01+I*(-2.73466444685450E-01):d := 5.20372606627448E-01+I*(-2.07939398208432E-01):e := 7.86073324372311E-01+I*(2.18425706615333E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.83688792955306E-01+I*(5.56689206020226E-02):b := 5.41308922695574E-01+I*(9.30634867349661E-02):c := -2.25072917050838E-01+I*(-4.76107023701769E-01):d := 5.53314951997444E-01+I*(-1.37704332161467E-01):e := 7.64268485700350E-01+I*(5.88429320772801E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.82165834016670E-01+I*(3.31468186922909E-01):b := 3.00352930439401E-01+I*(3.51585312781879E-01):c := 7.47554426691171E-02+I*(-4.89049646606683E-01):d := 5.33404022390931E-01+I*(-6.27262186662467E-02):e := 4.23151595487820E-01+I*(6.25655976906342E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.34883975248231E-01+I*(4.79442860471477E-01):b := -5.04046950811535E-02+I*(3.94740994748095E-01):c := 3.12756649162191E-01+I*(-3.06238316301752E-01):d := 4.69956363056129E-01+I*(-1.80881503160967E-02):e := 3.04123845859671E-01+I*(4.67073531109055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.23593589718456E-01+I*(4.30353946939043E-01):b := -3.46840562648238E-01+I*(2.02337509419640E-01):c := 3.77567292821499E-01+I*(-1.32124859582751E-02):d := 3.92659838937982E-01+I*(-2.46767753889220E-02):e := 2.97085421364698E-01+I*(3.47301907840136E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01320424016677E+00+I*(2.07170694529935E-01):b := -4.50249035309520E-01+I*(-1.35597414091748E-01):c := 2.38861753188779E-01+I*(2.52917801786682E-01):d := 3.37682352726545E-01+I*(-7.94092029887364E-02):e := 3.25666572544757E-01+I*(2.61989551987660E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01499499596076E+00+I*(-8.56769725480647E-02):b := -3.12244139449627E-01+I*(-4.60940269346765E-01):c := -3.84581062014564E-02+I*(3.67627227588564E-01):d := 3.30748481226849E-01+I*(-1.56675521958410E-01):e := 3.75233139796464E-01+I*(1.95094534509366E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.28127942562382E-01+I*(-3.11162376229873E-01):b := 2.60010040502280E-03+I*(-6.21459518588513E-01):c := -3.24631241073590E-01+I*(2.77241976261408E-01):d := 3.75102659975001E-01+I*(-2.20321962932550E-01):e := 4.52602867268043E-01+I*(1.40960209683518E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.40040251052703E-01+I*(-3.63778390141652E-01):b := 3.46964565322477E-01+I*(-5.42046421124038E-01):c := -4.85754061160826E-01+I*(2.40543114213646E-02):d := 4.49991075792951E-01+I*(-2.40567648827956E-01):e := 5.82638698405352E-01+I*(1.15013272442284E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91353981990284E-01+I*(-4.58631079875678E-01):b := 4.55588413202286E-01+I*(-2.06545270357904E-01):c := -5.84815671096303E-01+I*(-1.20117295960717E-01):d := 7.79875199206778E-01+I*(-4.42303162009213E-02):e := 5.48521476326012E-01+I*(1.79099690410913E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.89511420918438E-01+I*(-1.84056762661435E-01):b := 4.37180040914721E-01+I*(1.46377464212298E-01):c := -3.63453179883478E-01+I*(-3.22757874977037E-01):d := 8.12817544576774E-01+I*(2.60047498460436E-02):e := 6.44246485111516E-01+I*(1.60344377974308E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.87988461979802E-01+I*(9.17425036594510E-02):b := 1.96224048658548E-01+I*(4.04899290259211E-01):c := -6.36248201635226E-02+I*(-3.35700497881951E-01):d := 7.92906614970261E-01+I*(1.00982863341264E-01):e := 5.32482578753935E-01+I*(3.19045184761224E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.40706603211363E-01+I*(2.39717177208020E-01):b := -1.54533576862007E-01+I*(4.48054972225427E-01):c := 1.74376386329551E-01+I*(-1.52889167577019E-01):d := 7.29458955635460E-01+I*(1.45620931691414E-01):e := 3.90484169141955E-01+I*(2.97799739464774E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.29416217681588E-01+I*(1.90628263675585E-01):b := -4.50969444429091E-01+I*(2.55651486896972E-01):c := 2.39187029988859E-01+I*(1.40136662766457E-01):d := 6.52162431517312E-01+I*(1.39032306618589E-01):e := 3.32815301484632E-01+I*(2.24947707257578E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.11902686812990E+00+I*(-3.25549887335227E-02):b := -5.54377917090374E-01+I*(-8.22834366144165E-02):c := 1.00481490356140E-01+I*(4.06266950511414E-01):d := 5.97184945305875E-01+I*(8.42998790187745E-02):e := 3.21602003498184E-01+I*(1.58079743656133E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12081762392389E+00+I*(-3.25402655811522E-01):b := -4.16373021230481E-01+I*(-4.07626291869433E-01):c := -1.76838369034096E-01+I*(5.20976376313296E-01):d := 5.90251073806179E-01+I*(7.03356004910068E-03):e := 3.35021164438048E-01+I*(1.00585062605061E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.33950570525514E-01+I*(-5.50888059493331E-01):b := -1.01528781375830E-01+I*(-5.68145541111182E-01):c := -4.63011503906230E-01+I*(4.30591124986139E-01):d := 6.34605252554331E-01+I*(-5.66128809250393E-02):e := 3.69999726446052E-01+I*(4.99857936431358E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.45862879015835E-01+I*(-6.03504073405110E-01):b := 2.42835683541624E-01+I*(-4.88732443646706E-01):c := -6.24134323993465E-01+I*(1.77403460146097E-01):d := 7.09493668372281E-01+I*(-7.68585668204454E-02):e := 4.36000693123348E-01+I*(1.09197287546655E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.18326119172299E-01+I*(-7.10293081491720E-01):b := 3.41551497800335E-01+I*(-2.32637149190070E-01):c := -7.89392035232827E-01+I*(-9.15941510970977E-02):d := 8.73435548719556E-01+I*(2.47983167550568E-01):e := 4.37762861980220E-01+I*(-1.14180195229123E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.16483558100452E-01+I*(-4.35718764277476E-01):b := 3.23143125512769E-01+I*(1.20285585380132E-01):c := -5.68029544020001E-01+I*(-2.94234730113417E-01):d := 9.06377894089552E-01+I*(3.18218233597534E-01):e := 5.50818312224510E-01+I*(-7.84862114886623E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.14960599161816E-01+I*(-1.59919497956590E-01):b := 8.21871332565966E-02+I*(3.78807411427044E-01):c := -2.68201184300046E-01+I*(-3.07177353018331E-01):d := 8.86466964483039E-01+I*(3.93196347092754E-01):e := 5.79474827926024E-01+I*(7.18232469045500E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67678740393377E-01+I*(-1.19448244080216E-02):b := -2.68570492263958E-01+I*(4.21963093393260E-01):c := -3.01999778069723E-02+I*(-1.24366022713399E-01):d := 8.23019305148238E-01+I*(4.37834415442904E-01):e := 4.68658378522653E-01+I*(1.49420127499643E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.56388354863602E-01+I*(-6.10337379404564E-02):b := -5.65006359831043E-01+I*(2.29559608064806E-01):c := 3.46106658523355E-02+I*(1.68659807630077E-01):d := 7.45722781030090E-01+I*(4.31245790370079E-01):e := 3.79707723744509E-01+I*(1.23904019124761E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.04599900531192E+00+I*(-2.84216990349564E-01):b := -6.68414832492325E-01+I*(-1.08375315446582E-01):c := -1.04094873780384E-01+I*(4.34790095375034E-01):d := 6.90745294818653E-01+I*(3.76513362770264E-01):e := 3.38353188815591E-01+I*(7.35754203546720E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.04778976110591E+00+I*(-5.77064657427563E-01):b := -5.30409936632433E-01+I*(-4.33718170701599E-01):c := -3.81414733170620E-01+I*(5.49499521176916E-01):d := 6.83811423318958E-01+I*(2.99247043800590E-01):e := 3.25787513958473E-01+I*(2.18278599602112E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.60922707707528E-01+I*(-8.02550061109372E-01):b := -2.15565696777782E-01+I*(-5.94237419943348E-01):c := -6.67587868042753E-01+I*(4.59114269849760E-01):d := 7.28165602067109E-01+I*(2.35600602826450E-01):e := 3.33947468470419E-01+I*(-2.90742696560620E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.72835016197849E-01+I*(-8.55166075021151E-01):b := 1.28798768139673E-01+I*(-5.14824322478872E-01):c := -8.28710688129989E-01+I*(2.05926605009716E-01):d := 8.03054017885060E-01+I*(2.15354916931044E-01):e := 3.66305971493655E-01+I*(-7.85883693820219E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00618314200021E-01+I*(-8.56135953992598E-01):b := 2.70965688873000E-01+I*(-3.25926204247231E-01):c := -9.64440946280724E-01+I*(-2.01243306575723E-01):d := 7.57275727821293E-01+I*(5.31971116407590E-01):e := 3.63162742213702E-01+I*(-2.25898474049960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22424687182550E-03+I*(-5.81561636778355E-01):b := 2.52557316585434E-01+I*(2.69965303229706E-02):c := -7.43078455067898E-01+I*(-4.03883885592042E-01):d := 7.90218073191290E-01+I*(6.02206182454556E-01):e := 4.63262319986728E-01+I*(-2.65165583530735E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.72527941895382E-02+I*(-3.05762370457469E-01):b := 1.16013243292615E-02+I*(2.85518356369883E-01):c := -4.43250095347943E-01+I*(-4.16826508496957E-01):d := 7.70307143584776E-01+I*(6.77184295949776E-01):e := 5.92813320514773E-01+I*(-1.78844673943998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.49970935421099E-01+I*(-1.57787696908900E-01):b := -3.39156301191293E-01+I*(3.28674038336099E-01):c := -2.05248888854870E-01+I*(-2.34015178192025E-01):d := 7.06859484249975E-01+I*(7.21822364299926E-01):e := 5.60093257654545E-01+I*(-1.87139387703071E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.38680549891324E-01+I*(-2.06876610441335E-01):b := -6.35592168758378E-01+I*(1.36270553007645E-01):c := -1.40438245195562E-01+I*(5.90106521514511E-02):d := 6.29562960131827E-01+I*(7.15233739227101E-01):e := 4.48194863909540E-01+I*(2.00414905945931E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.28291200339639E-01+I*(-4.30059862850442E-01):b := -7.39000641419660E-01+I*(-2.01664370503744E-01):c := -2.79143784828281E-01+I*(3.25140939896408E-01):d := 5.74585473920390E-01+I*(6.60501311627286E-01):e := 3.74515489210511E-01+I*(-8.90486732873569E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.30081956133628E-01+I*(-7.22907529928441E-01):b := -6.00995745559768E-01+I*(-5.27007225758761E-01):c := -5.56463644218517E-01+I*(4.39850365698290E-01):d := 5.67651602420694E-01+I*(5.83234992657613E-01):e := 3.35659756250180E-01+I*(-5.46309367398554E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.43214902735250E-01+I*(-9.48392933610251E-01):b := -2.86151505705117E-01+I*(-6.87526475000509E-01):c := -8.42636779090650E-01+I*(3.49465114371134E-01):d := 6.12005781168846E-01+I*(5.19588551683473E-01):e := 3.19564964278891E-01+I*(-1.06108038091458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.55127211225571E-01+I*(-1.00100894752203E+00):b := 5.82129592123375E-02+I*(-6.08113377536033E-01):c := -1.00375959917789E+00+I*(9.62774495310908E-02):d := 6.86894196986796E-01+I*(4.99342865788066E-01):e := 3.24743343101613E-01+I*(-1.63540010437417E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59901531427281E-01+I*(-8.27918196472171E-01):b := 2.76858870891265E-01+I*(-4.42761449875783E-01):c := -1.02805507330874E+00+I*(-3.97758703933522E-01):d := 4.85748207682895E-01+I*(6.74852412925458E-01):e := 2.98987701223503E-01+I*(-3.45409358182767E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.61744092499128E-01+I*(-5.53343879257928E-01):b := 2.58450498603699E-01+I*(-8.98387153055807E-02):c := -8.06692582095915E-01+I*(-6.00399282949842E-01):d := 5.18690553052891E-01+I*(7.45087478972423E-01):e := 3.60589223530952E-01+I*(-4.53863574070127E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.63267051437764E-01+I*(-2.77544612937042E-01):b := 1.74945063475271E-02+I*(1.68683110741332E-01):c := -5.06864222375960E-01+I*(-6.13341905854756E-01):d := 4.98779623446377E-01+I*(8.20065592467644E-01):e := 5.60370780327282E-01+I*(-5.00097839531845E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.94510897937970E-02+I*(-1.29569939388473E-01):b := -3.33263119173028E-01+I*(2.11838792707548E-01):c := -2.68863015882886E-01+I*(-4.30530575549824E-01):d := 4.35331964111576E-01+I*(8.64703660817794E-01):e := 7.05421049964002E-01+I*(-2.74943996839853E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78160704264022E-01+I*(-1.78658852920908E-01):b := -6.29698986740113E-01+I*(1.94353073790932E-02):c := -2.04052372223578E-01+I*(-1.37504745206348E-01):d := 3.58035439993428E-01+I*(8.58115035744969E-01):e := 5.76269034732446E-01+I*(-1.10333768587215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67771354712337E-01+I*(-4.01842105330015E-01):b := -7.33107459401395E-01+I*(-3.18499616132295E-01):c := -3.42757911856298E-01+I*(1.28625542538609E-01):d := 3.03057953781991E-01+I*(8.03382608145154E-01):e := 4.49171511229447E-01+I*(-1.02646598442505E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.69562110506326E-01+I*(-6.94689772408015E-01):b := -5.95102563541502E-01+I*(-6.43842471387312E-01):c := -6.20077771246533E-01+I*(2.43334968340490E-01):d := 2.96124082282296E-01+I*(7.26116289175480E-01):e := 3.71951440766797E-01+I*(-1.41280286877737E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.82695057107948E-01+I*(-9.20175176089824E-01):b := -2.80258323686851E-01+I*(-8.04361720629060E-01):c := -9.06250906118667E-01+I*(1.52949717013334E-01):d := 3.40478261030447E-01+I*(6.62469848201340E-01):e := 3.24972847149312E-01+I*(-1.94479369752448E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.46073655982686E-02+I*(-9.72791190001602E-01):b := 6.41061412306032E-02+I*(-7.24948623164585E-01):c := -1.06737372620590E+00+I*(-1.00237947826709E-01):d := 4.15366676848398E-01+I*(6.42224162305934E-01):e := 2.98853860367599E-01+I*(-2.60153601861753E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.91898432392994E-01+I*(-6.12741368082188E-01):b := 2.55960094490887E-01+I*(-7.69382248731869E-01):c := -4.94196100799262E-01+I*(-5.00706111229323E-01):d := -3.11795343601419E-02+I*(5.31904159746501E-01):e := -6.50572615610426E-02+I*(-5.83701502208254E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.93740993464841E-01+I*(-3.38167050867944E-01):b := 2.37551722203321E-01+I*(-4.16459514161666E-01):c := -2.72833609586436E-01+I*(-7.03346690245642E-01):d := 1.76281100985409E-03+I*(6.02139225793466E-01):e := -2.46159599868458E-01+I*(-6.23322346980247E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95263952403477E-01+I*(-6.23677845470585E-02):b := -3.40427005285134E-03+I*(-1.57937688114753E-01):c := 2.69947501335188E-02+I*(-7.16289313150556E-01):d := -1.81481185966591E-02+I*(6.77117339288687E-01):e := -5.03348516688240E-01+I*(-7.40501498073736E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42545811171916E-01+I*(8.56068890015100E-02):b := -3.54161895573406E-01+I*(-1.14782006148538E-01):c := 2.64995956626592E-01+I*(-5.33477982845625E-01):d := -8.15957779314606E-02+I*(7.21755407638836E-01):e := -9.30766513129674E-01+I*(-1.23156844018353E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.46163803298309E-01+I*(3.65179754690757E-02):b := -6.50597763140491E-01+I*(-3.07185491476992E-01):c := 3.29806600285901E-01+I*(-2.40452152502148E-01):d := -1.58892302049608E-01+I*(7.15166782566011E-01):e := 4.03433219670070E-01+I*(-2.73665645337298E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.35774453746624E-01+I*(-1.86665276940032E-01):b := -7.54006235801773E-01+I*(-6.45120414988380E-01):c := 1.91101060653181E-01+I*(2.56781352428084E-02):d := -2.13869788261045E-01+I*(6.60434354966197E-01):e := 9.59058298321493E-01+I*(-1.00956723069354E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.37565209540614E-01+I*(-4.79512944018031E-01):b := -6.16001339941880E-01+I*(-9.70463270243398E-01):c := -8.62187987370545E-02+I*(1.40387561044690E-01):d := -2.20803659760741E-01+I*(5.83168035996523E-01):e := 5.22255381843537E-01+I*(-6.66566170278702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.50698156142235E-01+I*(-7.04998347699840E-01):b := -3.01157100087230E-01+I*(-1.13098251948515E+00):c := -3.72391933609188E-01+I*(5.00023097175339E-02):d := -1.76449481012589E-01+I*(5.19521595022383E-01):e := 2.73560398783774E-01+I*(-5.91276688136632E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.37389535367444E-01+I*(-7.57614361611619E-01):b := 4.32073648302247E-02+I*(-1.05156942202067E+00):c := -5.33514753696424E-01+I*(-2.03185355122509E-01):d := -1.01561065194639E-01+I*(4.99275909126977E-01):e := 9.57195253510064E-02+I*(-5.74281273840489E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.09348162453511E-01+I*(-3.51279442123608E-01):b := 3.72043690529101E-01+I*(-7.83866824881034E-01):c := -3.11712691127313E-01+I*(-5.97478337362291E-01):d := -2.19040401989828E-01+I*(2.89312829521043E-01):e := -3.53057204824258E-01+I*(-6.17220794527038E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.11190723525357E-01+I*(-7.67051249093642E-02):b := 3.53635318241535E-01+I*(-4.30944090310832E-01):c := -9.03501999144878E-02+I*(-8.00118916378611E-01):d := -1.86098056619832E-01+I*(3.59547895568008E-01):e := -5.40037689392003E-01+I*(-4.67875464443975E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.12713682463993E-01+I*(1.99094141411522E-01):b := 1.12679325985363E-01+I*(-1.72422264263919E-01):c := 2.09478159805467E-01+I*(-8.13061539283525E-01):d := -2.06008986226345E-01+I*(4.34526009063229E-01):e := -7.59126549309177E-01+I*(-3.01789743809246E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59995541232432E-01+I*(3.47068814960090E-01):b := -2.38078299535192E-01+I*(-1.29266582297704E-01):c := 4.47479366298541E-01+I*(-6.30250208978594E-01):d := -2.69456645561146E-01+I*(4.79164077413379E-01):e := -1.10799569079063E+00+I*(-5.58213630436607E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28714073237793E-01+I*(2.97979901427656E-01):b := -5.34514167102277E-01+I*(-3.21670067626158E-01):c := 5.12290009957849E-01+I*(-3.37224378635117E-01):d := -3.46753169679294E-01+I*(4.72575452340554E-01):e := -2.06060564595193E+00+I*(5.13192085530469E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.18324723686108E-01+I*(7.47966490185481E-02):b := -6.37922639763559E-01+I*(-6.59604991137546E-01):c := 3.73584470325129E-01+I*(-7.10940908901602E-02):d := -4.01730655890731E-01+I*(4.17843024740739E-01):e := -5.68582065771217E+00+I*(-1.85774714999274E+01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.20115479480097E-01+I*(-2.18051018059451E-01):b := -4.99917743903666E-01+I*(-9.84947846392564E-01):c := 9.62646109348934E-02+I*(4.36153349117215E-02):d := -4.08664527390427E-01+I*(3.40576705771065E-01):e := 8.48475745986644E-01+I*(-1.77779169709966E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.33248426081719E-01+I*(-4.43536421741260E-01):b := -1.85073504049015E-01+I*(-1.14546709563431E+00):c := -1.89908523937240E-01+I*(-4.67699164154351E-02):d := -3.64310348642275E-01+I*(2.76930264796925E-01):e := 1.55424396676742E-01+I*(-1.06230230009533E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.54839265427961E-01+I*(-4.96152435653039E-01):b := 1.59290960868439E-01+I*(-1.06605399816984E+00):c := -3.51031344024476E-01+I*(-2.99957581255478E-01):d := -2.89421932824325E-01+I*(2.56684578901519E-01):e := -1.46928705809521E-01+I*(-7.90486510600386E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.54650944789341E-01+I*(-1.39771516380577E-01):b := 4.70279390291689E-01+I*(-7.20345556729815E-01):c := -1.09718301266657E-01+I*(-5.54312088729224E-01):d := -2.07015474430759E-01+I*(-1.72775490043350E-02):e := -8.72686590634093E-01+I*(-5.90902284983472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56493505861187E-01+I*(1.34802800833667E-01):b := 4.51871018004123E-01+I*(-3.67422822159613E-01):c := 1.11644189946168E-01+I*(-7.56952667745544E-01):d := -1.74073129060762E-01+I*(5.29575170426301E-02):e := -8.40041694143092E-01+I*(-1.67003355755363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.58016464799823E-01+I*(4.10602067154552E-01):b := 2.10915025747950E-01+I*(-1.08900996112700E-01):c := 4.11472549666123E-01+I*(-7.69895290650458E-01):d := -1.93984058667276E-01+I*(1.27935630537851E-01):e := -7.87032300523040E-01+I*(1.51978116280219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.29832356826175E-03+I*(5.58576740703121E-01):b := -1.39842599772604E-01+I*(-6.57453141464843E-02):c := 6.49473756159196E-01+I*(-5.87083960345526E-01):d := -2.57431718002077E-01+I*(1.72573698888001E-01):e := -7.10839351757510E-01+I*(4.63077818753703E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.83411290901963E-01+I*(5.09487827170686E-01):b := -4.36278467339689E-01+I*(-2.58148799474939E-01):c := 7.14284399818504E-01+I*(-2.94058130002050E-01):d := -3.34728242120225E-01+I*(1.65985073815176E-01):e := -5.78836873199046E-01+I*(8.53408209922065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.73021941350278E-01+I*(2.86304574761579E-01):b := -5.39686940000971E-01+I*(-5.96083722986327E-01):c := 5.75578860185785E-01+I*(-2.79278422570930E-02):d := -3.89705728331662E-01+I*(1.11252646215361E-01):e := -2.44239814900303E-01+I*(1.52449853832071E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.74812697144267E-01+I*(-6.54309231642086E-03):b := -4.01682044141079E-01+I*(-9.21426578241344E-01):c := 2.98259000795549E-01+I*(8.67815835447886E-02):d := -3.96639599831358E-01+I*(3.39863272456875E-02):e := 1.86412035808952E+00+I*(3.27522718156910E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.87945643745889E-01+I*(-2.32028495998230E-01):b := -8.68378042864278E-02+I*(-1.08194582748309E+00):c := 1.20858659234157E-02+I*(-3.60366778236801E-03):d := -3.52285421083206E-01+I*(-2.96601137284527E-02):e := 8.40065148896687E-01+I*(-4.12314607939780E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42047763790627E-04+I*(-2.84644509910008E-01):b := 2.57526660631027E-01+I*(-1.00253273001862E+00):c := -1.49036954163820E-01+I*(-2.56791332622411E-01):d := -2.77397005265256E-01+I*(-4.99057996238588E-02):e := -8.19000523670705E-01+I*(-1.38992313929731E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.91326813615635E-04+I*(-7.71844999570167E-02):b := 5.04701618091543E-01+I*(-6.08540751606425E-01):c := 1.72716488493226E-02+I*(-3.91405332804949E-01):d := -7.31348930006587E-04+I*(-2.44409930345097E-01):e := -2.40125355901168E+00+I*(3.03506112922791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.02033887885462E-01+I*(1.97389817257226E-01):b := 4.86293245803977E-01+I*(-2.55618017036223E-01):c := 2.38634140062148E-01+I*(-5.94045911821269E-01):d := 3.22109964399894E-02+I*(-1.74174864298132E-01):e := -1.07039889284394E+00+I*(4.95469321620449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.55684682409753E-03+I*(4.73189083578112E-01):b := 2.45337253547805E-01+I*(2.90380901069030E-03):c := 5.38462499782103E-01+I*(-6.06988534726183E-01):d := 1.23000668334764E-02+I*(-9.91967508029113E-02):e := -6.09147003805475E-01+I*(5.88476297897762E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.49161294407463E-01+I*(6.21163757126681E-01):b := -1.05420371972750E-01+I*(4.60594909769059E-02):c := 7.76463706275177E-01+I*(-4.24177204421251E-01):d := -5.11475925013249E-02+I*(-5.45586824527613E-02):e := -3.25393211648073E-01+I*(6.52627275281897E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.37870908877688E-01+I*(5.72074843594246E-01):b := -4.01856239539835E-01+I*(-1.46343994351549E-01):c := 8.41274349934484E-01+I*(-1.31151374077775E-01):d := -1.28444116619473E-01+I*(-6.11473075255865E-02):e := -8.64304517133446E-02+I*(7.10806250451694E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.27481559326003E-01+I*(3.48891591185139E-01):b := -5.05264712201117E-01+I*(-4.84278917862937E-01):c := 7.02568810301765E-01+I*(1.34978913667182E-01):d := -1.83421602830910E-01+I*(-1.15879735125401E-01):e := 1.73947307632365E-01+I*(7.78575547234914E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.29272315119992E-01+I*(5.60439241071389E-02):b := -3.67259816341224E-01+I*(-8.09621773117954E-01):c := 4.25248950911529E-01+I*(2.49688339469064E-01):d := -1.90355474330605E-01+I*(-1.93146054095075E-01):e := 5.50912954280946E-01+I*(8.84895930795381E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.42405261721614E-01+I*(-1.69441479574670E-01):b := -5.24155764865734E-02+I*(-9.70141022359702E-01):c := 1.39075816039396E-01+I*(1.59303088141907E-01):d := -1.46001295582454E-01+I*(-2.56792495069215E-01):e := 1.40015643172542E+00+I*(1.16099423252503E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.54317570211935E-01+I*(-2.22057493486448E-01):b := 2.91948888430881E-01+I*(-8.90727924895227E-01):c := -2.20470040478397E-02+I*(-9.38845766981354E-02):d := -7.11128797645034E-02+I*(-2.77038180964621E-01):e := 9.84130222177970E+00+I*(8.01445449535336E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.34966208219179E-01+I*(-1.92803553414719E-01):b := 4.59203830980664E-01+I*(-5.00767120400098E-01):c := 9.83715022527176E-03+I*(-1.84983951193355E-01):d := 3.03289339597943E-01+I*(-2.85806548976662E-01):e := 1.94163112212213E+00+I*(1.97432566262237E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.33123647147333E-01+I*(8.17707637995244E-02):b := 4.40795458693098E-01+I*(-1.47844385829895E-01):c := 2.31199641438097E-01+I*(-3.87624530209674E-01):d := 3.36231684967939E-01+I*(-2.15571482929697E-01):e := -3.25056398729220E-01+I*(1.71849417871827E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.31600688208697E-01+I*(3.57570030120410E-01):b := 1.99839466436926E-01+I*(1.10677440217018E-01):c := 5.31028001158052E-01+I*(-4.00567153114588E-01):d := 3.16320755361426E-01+I*(-1.40593369434476E-01):e := -1.71095257330399E-01+I*(9.43635568329011E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.84318829440258E-01+I*(5.05544703668979E-01):b := -1.50918159083629E-01+I*(1.53833122183233E-01):c := 7.69029207651126E-01+I*(-2.17755822809656E-01):d := 2.52873096026624E-01+I*(-9.59553010843263E-02):e := 2.49295718966058E-02+I*(6.97009645038069E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.73028443910483E-01+I*(4.56455790136544E-01):b := -4.47354026650714E-01+I*(-3.85703631452213E-02):c := 8.33839851310434E-01+I*(7.52700075338199E-02):d := 1.75576571908476E-01+I*(-1.02543926157151E-01):e := 1.77949489057617E-01+I*(5.72852841984211E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.62639094358798E-01+I*(2.33272537727437E-01):b := -5.50762499311996E-01+I*(-3.76505286656610E-01):c := 6.95134311677714E-01+I*(3.41400295278777E-01):d := 1.20599085697040E-01+I*(-1.57276353756966E-01):e := 3.20810243588495E-01+I*(4.89560231542108E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.64429850152788E-01+I*(-5.95751293505629E-02):b := -4.12757603452104E-01+I*(-7.01848141911627E-01):c := 4.17814452287479E-01+I*(4.56109721080659E-01):d := 1.13665214197344E-01+I*(-2.34542672726640E-01):e := 4.85576094086776E-01+I*(4.23303322844291E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.77562796754409E-01+I*(-2.85060533032372E-01):b := -9.79133635974526E-02+I*(-8.62367391153375E-01):c := 1.31641317415345E-01+I*(3.65724469753502E-01):d := 1.58019392945496E-01+I*(-2.98189113700780E-01):e := 7.29119567052900E-01+I*(3.73574423136182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.89475105244729E-01+I*(-3.37676546944150E-01):b := 2.46451101320002E-01+I*(-7.82954293688899E-01):c := -2.94815026718904E-02+I*(1.12536804913459E-01):d := 2.32907808763446E-01+I*(-3.18434799596186E-01):e := 1.22805279658404E+00+I*(4.33125045505218E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.40788836182311E-01+I*(-4.32529236678176E-01):b := 3.55074949199811E-01+I*(-4.47453142922766E-01):c := -1.28543112607368E-01+I*(-3.16348024686220E-02):d := 5.62791932177273E-01+I*(-1.22097466969151E-01):e := 1.11914993667843E+00+I*(-1.40439114207680E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.38946275110465E-01+I*(-1.57954919463933E-01):b := 3.36666576912245E-01+I*(-9.45304083525634E-02):c := 9.28193786054576E-02+I*(-2.34275381484942E-01):d := 5.95734277547269E-01+I*(-5.18624009221858E-02):e := 1.43920148077849E+00+I*(7.90110283135447E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.37423316171829E-01+I*(1.17844346856953E-01):b := 9.57105846560725E-02+I*(1.63991417694350E-01):c := 3.92647738325413E-01+I*(-2.47218004389856E-01):d := 5.75823347940756E-01+I*(2.31157125730346E-02):e := 5.82413742411400E-01+I*(9.71195910887649E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.90141457403390E-01+I*(2.65819020405522E-01):b := -2.55047040864482E-01+I*(2.07147099660565E-01):c := 6.30648944818486E-01+I*(-6.44066740849241E-02):d := 5.12375688605954E-01+I*(6.77537809231848E-02):e := 3.77132720035262E-01+I*(6.34989468220074E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.78851071873615E-01+I*(2.16730106873087E-01):b := -5.51482908431567E-01+I*(1.47436143321106E-02):c := 6.95459588477794E-01+I*(2.28619156258552E-01):d := 4.35079164487806E-01+I*(6.11651558503594E-02):e := 3.73409988811725E-01+I*(4.35478245285857E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06846172232193E+00+I*(-6.45314553602072E-03):b := -6.54891381092849E-01+I*(-3.23191309179278E-01):c := 5.56754048845075E-01+I*(4.94749444003509E-01):d := 3.80101678276369E-01+I*(6.43272825054503E-03):e := 4.11429884362315E-01+I*(3.02793855746411E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.07025247811592E+00+I*(-2.99300812614020E-01):b := -5.16886485232956E-01+I*(-6.48534164434295E-01):c := 2.79434189454839E-01+I*(6.09458869805391E-01):d := 3.73167806776674E-01+I*(-7.08335907191289E-02):e := 4.71209494555570E-01+I*(1.95579526366546E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.83385424717541E-01+I*(-5.24786216295829E-01):b := -2.02042245378306E-01+I*(-8.09053413676043E-01):c := -6.73894541729448E-03+I*(5.19073618478234E-01):d := 4.17521985524825E-01+I*(-1.34480031693269E-01):e := 5.63530870902927E-01+I*(9.39727789084013E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.95297733207862E-01+I*(-5.77402230207608E-01):b := 1.42322219539149E-01+I*(-7.29640316211568E-01):c := -1.67861765504530E-01+I*(2.65885953638192E-01):d := 4.92410401342776E-01+I*(-1.54725717588675E-01):e := 7.32858942686899E-01+I*(-7.12595702644729E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.67760973364325E-01+I*(-6.84191238294218E-01):b := 2.41038033797859E-01+I*(-4.73545021754932E-01):c := -3.33119476743892E-01+I*(-3.11165760500251E-03):d := 6.56352281690051E-01+I*(1.70116016782339E-01):e := 6.50494333440969E-01+I*(-3.37597761692734E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.65918412292480E-01+I*(-4.09616921079975E-01):b := 2.22629661510293E-01+I*(-1.20622287184730E-01):c := -1.11756985531066E-01+I*(-2.05752236621322E-01):d := 6.89294627060047E-01+I*(2.40351082829304E-01):e := 1.02560078485293E+00+I*(-3.90455021472854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.64395453353844E-01+I*(-1.33817654759088E-01):b := -1.83263307458791E-02+I*(1.37899538862183E-01):c := 1.88071374188889E-01+I*(-2.18694859526236E-01):d := 6.69383697453534E-01+I*(3.15329196324524E-01):e := 1.25434067953059E+00+I*(2.27489044375907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.17113594585405E-01+I*(1.41570187894799E-02):b := -3.69083956266434E-01+I*(1.81055220828399E-01):c := 4.26072580681963E-01+I*(-3.58835292213042E-02):d := 6.05936038118733E-01+I*(3.59967264674674E-01):e := 7.66011988848409E-01+I*(4.15106200068850E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.05823209055630E-01+I*(-3.49318947429547E-02):b := -6.65519823833519E-01+I*(-1.13482645000554E-02):c := 4.90883224341271E-01+I*(2.57142301122172E-01):d := 5.28639514000585E-01+I*(3.53378639601849E-01):e := 5.56916850919499E-01+I*(2.70712555232381E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.95433859503945E-01+I*(-2.58115147152062E-01):b := -7.68928296494801E-01+I*(-3.49283188011444E-01):c := 3.52177684708551E-01+I*(5.23272588867129E-01):d := 4.73662027789148E-01+I*(2.98646212002035E-01):e := 4.87817739771360E-01+I*(1.39828649842817E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.97224615297934E-01+I*(-5.50962814230062E-01):b := -6.30923400634908E-01+I*(-6.74626043266461E-01):c := 7.48578253183154E-02+I*(6.37982014669011E-01):d := 4.66728156289453E-01+I*(2.21379893032361E-01):e := 4.68062396484145E-01+I*(2.94875598878937E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.10357561899555E-01+I*(-7.76448217911871E-01):b := -3.16079160780258E-01+I*(-8.35145292508209E-01):c := -2.11315309553818E-01+I*(5.47596763341854E-01):d := 5.11082335037604E-01+I*(1.57733452058221E-01):e := 4.76804748498168E-01+I*(-7.68359126846884E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.22269870389876E-01+I*(-8.29064231823649E-01):b := 2.82853041371965E-02+I*(-7.55732195043734E-01):c := -3.72438129641054E-01+I*(2.94409098501811E-01):d := 5.85970750855554E-01+I*(1.37487766162815E-01):e := 5.21243959985799E-01+I*(-1.95408495697648E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00531683920473E-02+I*(-8.30034110795096E-01):b := 1.70452224870524E-01+I*(-5.66834076812093E-01):c := -5.08168387791789E-01+I*(-1.12760813083628E-01):d := 5.40192460791788E-01+I*(4.54103965639361E-01):e := 3.74608637383397E-01+I*(-4.62449035913458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.17893926797987E-02+I*(-5.55459793580853E-01):b := 1.52043852582958E-01+I*(-2.13911342241891E-01):c := -2.86805896578963E-01+I*(-3.15401392099948E-01):d := 5.73134806161784E-01+I*(5.24339031686327E-01):e := 4.68539971737528E-01+I*(-6.71991661668594E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.66876483815653E-02+I*(-2.79660527259967E-01):b := -8.89121396732144E-02+I*(4.46104838050221E-02):c := 1.30224631409917E-02+I*(-3.28344015004862E-01):d := 5.53223876555271E-01+I*(5.99317145181547E-01):e := 9.21712160509740E-01+I*(-8.00576034227224E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.99405789613126E-01+I*(-1.31685853711398E-01):b := -4.39669765193769E-01+I*(8.77661657712376E-02):c := 2.51023669634065E-01+I*(-1.45532684699930E-01):d := 4.89776217220469E-01+I*(6.43955213531697E-01):e := 1.14219203448785E+00+I*(-1.73878244080844E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.88115404083351E-01+I*(-1.80774767243833E-01):b := -7.36105632760854E-01+I*(-1.04637319557217E-01):c := 3.15834313293373E-01+I*(1.47493145643546E-01):d := 4.12479693102322E-01+I*(6.37366588458872E-01):e := 7.69457866251870E-01+I*(1.71170034874527E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.77726054531667E-01+I*(-4.03958019652941E-01):b := -8.39514105422136E-01+I*(-4.42572243068605E-01):c := 1.77128773660654E-01+I*(4.13623433388503E-01):d := 3.57502206890884E-01+I*(5.82634160859058E-01):e := 5.71038608915374E-01+I*(-4.39958693503491E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.79516810325655E-01+I*(-6.96805686730940E-01):b := -7.01509209562243E-01+I*(-7.67915098323622E-01):c := -1.00191085729582E-01+I*(5.28332859190385E-01):d := 3.50568335391189E-01+I*(5.05367841889383E-01):e := 4.70825934227961E-01+I*(-1.29486181486989E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.92649756927277E-01+I*(-9.22291090412749E-01):b := -3.86664969707593E-01+I*(-9.28434347565370E-01):c := -3.86364220601716E-01+I*(4.37947607863228E-01):d := 3.94922514139341E-01+I*(4.41721400915244E-01):e := 4.12102173103264E-01+I*(-2.19378315037736E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.04562065417598E-01+I*(-9.74907104324528E-01):b := -4.23005047901383E-02+I*(-8.49021250100895E-01):c := -5.47487040688951E-01+I*(1.84759943023186E-01):d := 4.69810929957291E-01+I*(4.21475715019837E-01):e := 3.77737220852704E-01+I*(-3.23142360990095E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.10466677235255E-01+I*(-8.01816353274670E-01):b := 1.76345406888790E-01+I*(-6.83669322440645E-01):c := -5.71782514819806E-01+I*(-3.09276210441428E-01):d := 2.68664940653389E-01+I*(5.96985262157229E-01):e := 1.56160554493052E-01+I*(-5.33784407542668E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.12309238307101E-01+I*(-5.27242036060426E-01):b := 1.57937034601224E-01+I*(-3.30746587870442E-01):c := -3.50420023606980E-01+I*(-5.11916789457747E-01):d := 3.01607286023385E-01+I*(6.67220328204194E-01):e := 7.12138767640240E-02+I*(-6.96252368090283E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13832197245737E-01+I*(-2.51442769739540E-01):b := -8.30189576549487E-02+I*(-7.22247618235292E-02):c := -5.05916638870249E-02+I*(-5.24859412362661E-01):d := 2.81696356416872E-01+I*(7.42198441699414E-01):e := 7.12844838829512E-02+I*(-1.03983351961299E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.88859439858239E-02+I*(-1.03468096190972E-01):b := -4.33776583175504E-01+I*(-2.90690798573140E-02):c := 1.87409542606049E-01+I*(-3.42048082057730E-01):d := 2.18248697082070E-01+I*(7.86836510049565E-01):e := 7.67591311574779E-01+I*(-1.39462103722263E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27595558456048E-01+I*(-1.52557009723406E-01):b := -7.30212450742588E-01+I*(-2.21472565185768E-01):c := 2.52220186265357E-01+I*(-4.90222517142536E-02):d := 1.40952172963922E-01+I*(7.80247884976739E-01):e := 1.05124748211737E+00+I*(-5.51086668500141E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.17206208904364E-01+I*(-3.75740262132514E-01):b := -8.33620923403871E-01+I*(-5.59407488697157E-01):c := 1.13514646632637E-01+I*(2.17108036030704E-01):d := 8.59746867524852E-02+I*(7.25515457376925E-01):e := 6.91282286153285E-01+I*(-3.22455449809799E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.18996964698353E-01+I*(-6.68587929210514E-01):b := -6.95616027543978E-01+I*(-8.84750343952174E-01):c := -1.63805212757599E-01+I*(3.31817461832585E-01):d := 7.90408152527897E-02+I*(6.48249138407251E-01):e := 4.82113294725641E-01+I*(-3.26579512941508E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.32129911299974E-01+I*(-8.94073332892322E-01):b := -3.80771787689327E-01+I*(-1.04526959319392E+00):c := -4.49978347629732E-01+I*(2.41432210505429E-01):d := 1.23394994000942E-01+I*(5.84602697433111E-01):e := 3.49765230785549E-01+I*(-3.72929336833736E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.40422197902951E-02+I*(-9.46689346804101E-01):b := -3.64073227718725E-02+I*(-9.65856495729446E-01):c := -6.11101167716968E-01+I*(-1.17554543346141E-02):d := 1.98283409818892E-01+I*(5.64357011537705E-01):e := 2.47837649310847E-01+I*(-4.38799507290336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.13855639957358E-01+I*(-5.60243546938221E-01):b := 3.33814909493788E-01+I*(-1.01853719508126E+00):c := -2.01546493312023E-01+I*(-1.39638241539728E-01):d := -1.47422925046796E-01+I*(3.32716027282150E-01):e := -4.26521172327011E-01+I*(-5.19186732128861E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.15698201029204E-01+I*(-2.85669229723977E-01):b := 3.15406537206222E-01+I*(-6.65614460511059E-01):c := 1.98159979008029E-02+I*(-3.42278820556047E-01):d := -1.14480579676800E-01+I*(4.02951093329116E-01):e := -5.39801050410177E-01+I*(-3.50008654763479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.17221159967840E-01+I*(-9.86996340309113E-03):b := 7.44505449500493E-02+I*(-4.07092634464146E-01):c := 3.19644357620758E-01+I*(-3.55221443460961E-01):d := -1.34391509283313E-01+I*(4.77929206824336E-01):e := -6.71541258215435E-01+I*(-1.85093192200314E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64503018736279E-01+I*(1.38104710145477E-01):b := -2.76307080570505E-01+I*(-3.63936952497931E-01):c := 5.57645564113832E-01+I*(-1.72410113156030E-01):d := -1.97839168618115E-01+I*(5.22567275174486E-01):e := -8.71643507013297E-01+I*(1.93145651407742E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.24206595733945E-01+I*(8.90157966130429E-02):b := -5.72742948137590E-01+I*(-5.56340437826385E-01):c := 6.22456207773140E-01+I*(1.20615717187447E-01):d := -2.75135692736263E-01+I*(5.15978650101661E-01):e := -1.33008751357534E+00+I*(3.49005837389823E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13817246182261E-01+I*(-1.34167455796065E-01):b := -6.76151420798872E-01+I*(-8.94275361337774E-01):c := 4.83750668140420E-01+I*(3.86746004932404E-01):d := -3.30113178947700E-01+I*(4.61246222501846E-01):e := -3.79811817973755E+00+I*(3.12925293472071E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.15608001976250E-01+I*(-4.27015122874064E-01):b := -5.38146524938980E-01+I*(-1.21961821659279E+00):c := 2.06430808750185E-01+I*(5.01455430734285E-01):d := -3.37047050447395E-01+I*(3.83979903532173E-01):e := -1.84281529837162E-01+I*(-2.56824902875674E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28740948577871E-01+I*(-6.52500526555873E-01):b := -2.23302285084329E-01+I*(-1.38013746583454E+00):c := -7.97423261219493E-02+I*(4.11070179407129E-01):d := -2.92692871699243E-01+I*(3.20333462558032E-01):e := -1.51554912851823E-01+I*(-1.15540348519228E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59346742931808E-01+I*(-7.05116540467651E-01):b := 1.21062179833126E-01+I*(-1.30072436837006E+00):c := -2.40865146209185E-01+I*(1.57882514567086E-01):d := -2.17804455881293E-01+I*(3.00087776662627E-01):e := -3.05317649015641E-01+I*(-7.42478963077929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.31305370017875E-01+I*(-2.98781620979640E-01):b := 4.49898505532002E-01+I*(-1.03302177123043E+00):c := -1.90630836400746E-02+I*(-2.36410467672697E-01):d := -3.35283792676482E-01+I*(9.01246970566927E-02):e := -5.64663137386671E-01+I*(-2.63438457653672E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.33147931089721E-01+I*(-2.42073037653971E-02):b := 4.31490133244436E-01+I*(-6.80099036660225E-01):c := 2.02299407572751E-01+I*(-4.39051046689016E-01):d := -3.02341447306486E-01+I*(1.60359763103658E-01):e := -5.28796747640093E-01+I*(-1.09093366364168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.34670890028357E-01+I*(2.51591962555489E-01):b := 1.90534140988264E-01+I*(-4.21577210613312E-01):c := 5.02127767292706E-01+I*(-4.51993669593930E-01):d := -3.22252376912999E-01+I*(2.35337876598878E-01):e := -5.26891843307173E-01+I*(2.50372579861745E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.81952748796796E-01+I*(3.99566636104058E-01):b := -1.60223484532291E-01+I*(-3.78421528647096E-01):c := 7.40128973785780E-01+I*(-2.69182339288999E-01):d := -3.85700036247801E-01+I*(2.79975944949028E-01):e := -5.53892158639529E-01+I*(1.66147352061069E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06756865673429E-01+I*(3.50477722571623E-01):b := -4.56659352099376E-01+I*(-5.70825013975551E-01):c := 8.04939617445088E-01+I*(2.38434910544780E-02):d := -4.62996560365949E-01+I*(2.73387319876203E-01):e := -6.37823544220434E-01+I*(3.44923044543216E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.96367516121744E-01+I*(1.27294470162516E-01):b := -5.60067824760658E-01+I*(-9.08759937486939E-01):c := 6.66234077812368E-01+I*(2.89973778799435E-01):d := -5.17974046577386E-01+I*(2.18654892276389E-01):e := -9.20528931487827E-01+I*(5.88454408955432E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.98158271915734E-01+I*(-1.65553196915484E-01):b := -4.22062928900765E-01+I*(-1.23410279274196E+00):c := 3.88914218422133E-01+I*(4.04683204601317E-01):d := -5.24907918077081E-01+I*(1.41388573306715E-01):e := -1.81614137763221E+00+I*(2.84059547847642E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.11291218517355E-01+I*(-3.91038600597293E-01):b := -1.07218689046114E-01+I*(-1.39462204198370E+00):c := 1.02741083549999E-01+I*(3.14297953274160E-01):d := -4.80553739328929E-01+I*(7.77421323325748E-02):e := -1.17234219611236E+00+I*(-7.15952607289231E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76796472992324E-01+I*(-4.43654614509071E-01):b := 2.37145775871340E-01+I*(-1.31520894451923E+00):c := -5.83817365372367E-02+I*(6.11102884341174E-02):d := -4.05665323510979E-01+I*(5.74964464371688E-02):e := -6.87554607524216E-01+I*(-4.75841237137763E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.76608152353704E-01+I*(-8.72736952366093E-02):b := 5.48134205294590E-01+I*(-9.69500503079208E-01):c := 1.82931306220582E-01+I*(-1.93244219039629E-01):d := -3.23258865117413E-01+I*(-2.16465681468686E-01):e := -6.48564763424188E-01+I*(4.29848726455599E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78450713425550E-01+I*(1.87300621977634E-01):b := 5.29725833007024E-01+I*(-6.16577768509005E-01):c := 4.04293797433407E-01+I*(-3.95884798055949E-01):d := -2.90316519747417E-01+I*(-1.46230615421720E-01):e := -5.11949487703093E-01+I*(8.46957128172093E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.79973672364186E-01+I*(4.63099888298520E-01):b := 2.88769840750851E-01+I*(-3.58055942462092E-01):c := 7.04122157153362E-01+I*(-4.08827420960863E-01):d := -3.10227449353930E-01+I*(-7.12525019264999E-02):e := -4.37222859305295E-01+I*(1.71870555927161E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.72555311326254E-02+I*(6.11074561847088E-01):b := -6.19877847697036E-02+I*(-3.14900260495877E-01):c := 9.42123363646436E-01+I*(-2.26016090655931E-01):d := -3.73675108688731E-01+I*(-2.66144335763497E-02):e := -3.92176387457813E-01+I*(2.66645286453202E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.61454083337599E-01+I*(5.61985648314654E-01):b := -3.58423652336788E-01+I*(-5.07303745824332E-01):c := 1.00693400730574E+00+I*(6.70097396875453E-02):d := -4.50971632806879E-01+I*(-3.32030586491749E-02):e := -3.71603840567013E-01+I*(3.84260417105212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.51064733785914E-01+I*(3.38802395905546E-01):b := -4.61832124998070E-01+I*(-8.45238669335720E-01):c := 8.68228467673024E-01+I*(3.33140027432502E-01):d := -5.05949119018317E-01+I*(-8.79354862489893E-02):e := -4.02395240171912E-01+I*(5.53851429249423E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.52855489579903E-01+I*(4.59547288275469E-02):b := -3.23827229138178E-01+I*(-1.17058152459074E+00):c := 5.90908608282789E-01+I*(4.47849453234384E-01):d := -5.12882990518012E-01+I*(-1.65201805218663E-01):e := -6.32641169118110E-01+I*(7.82437107123887E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65988436181525E-01+I*(-1.79530674854262E-01):b := -8.98298928352709E-03+I*(-1.33110077383248E+00):c := 3.04735473410655E-01+I*(3.57464201907227E-01):d := -4.68528811769860E-01+I*(-2.28848246192803E-01):e := -1.18524939280165E+00+I*(5.17361634833197E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20992553281541E-02+I*(-2.32146688766040E-01):b := 3.35381475633928E-01+I*(-1.25168767636801E+00):c := 1.43612653323420E-01+I*(1.04276537067184E-01):d := -3.93640395951910E-01+I*(-2.49093932088209E-01):e := -9.33824404219973E-01+I*(7.11867401243169E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21485343779790E-02+I*(-2.46866788130493E-02):b := 5.82556433094444E-01+I*(-8.57695697955817E-01):c := 3.09921256336562E-01+I*(-3.03374631153539E-02):d := -1.16974739616661E-01+I*(-4.43598062809448E-01):e := -6.80903973366153E-01+I*(3.46876726256742E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.23991095449825E-01+I*(2.49887638401194E-01):b := 5.64148060806878E-01+I*(-5.04772963385615E-01):c := 5.31283747549387E-01+I*(-2.32978042131674E-01):d := -8.40323942466646E-02+I*(-3.73362996762482E-01):e := -4.86731894876957E-01+I*(2.86626328890791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.55140543884611E-02+I*(5.25686904722080E-01):b := 3.23192068550706E-01+I*(-2.46251137338702E-01):c := 8.31112107269342E-01+I*(-2.45920665036588E-01):d := -1.03943323853178E-01+I*(-2.98384883267262E-01):e := -3.62085930302741E-01+I*(3.07334799792748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.27204086843100E-01+I*(6.73661578270648E-01):b := -2.75655569698491E-02+I*(-2.03095455372487E-01):c := 1.06911331376242E+00+I*(-6.31093347316556E-02):d := -1.67390983187979E-01+I*(-2.53746814917112E-01):e := -2.73478820476242E-01+I*(3.53725967958482E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.15913701313324E-01+I*(6.24572664738214E-01):b := -3.24001424536934E-01+I*(-3.95498940700941E-01):c := 1.13392395742172E+00+I*(2.29916495611820E-01):d := -2.44687507306127E-01+I*(-2.60335439989937E-01):e := -2.02145687473487E-01+I*(4.21597673517039E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.05524351761640E-01+I*(4.01389412329106E-01):b := -4.27409897198216E-01+I*(-7.33433864212330E-01):c := 9.95218417789004E-01+I*(4.96046783356778E-01):d := -2.99664993517564E-01+I*(-3.15067867589752E-01):e := -1.44112209675790E-01+I*(5.26990083199388E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.07315107555629E-01+I*(1.08541745251107E-01):b := -2.89405001338323E-01+I*(-1.05877671946735E+00):c := 7.17898558398769E-01+I*(6.10756209158659E-01):d := -3.06598865017260E-01+I*(-3.92334186559426E-01):e := -1.30931710667793E-01+I*(7.13087196160466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.20448054157250E-01+I*(-1.16943658430702E-01):b := 2.54392385163278E-02+I*(-1.21929596870909E+00):c := 4.31725423526635E-01+I*(5.20370957831503E-01):d := -2.62244686269108E-01+I*(-4.55980627533565E-01):e := -3.66427141973747E-01+I*(9.83072345614757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.32360362647571E-01+I*(-1.69559672342480E-01):b := 3.69803703433782E-01+I*(-1.13988287124462E+00):c := 2.70602603439400E-01+I*(2.67183292991460E-01):d := -1.87356270451158E-01+I*(-4.76226313428971E-01):e := -8.33888043743485E-01+I*(7.10225618107757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.13009000654815E-01+I*(-1.40305732270751E-01):b := 5.37058645983565E-01+I*(-7.49922066749490E-01):c := 3.02486757712511E-01+I*(1.76083918496240E-01):d := 1.87045948911288E-01+I*(-4.84994681441012E-01):e := -5.63538023120712E-01+I*(8.96094238917133E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.11166439582969E-01+I*(1.34268584943492E-01):b := 5.18650273695999E-01+I*(-3.96999332179288E-01):c := 5.23849248925336E-01+I*(-2.65566605200792E-02):d := 2.19988294281285E-01+I*(-4.14759615394047E-01):e := -4.39422572908223E-01+I*(5.62537547396951E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.09643480644333E-01+I*(4.10067851264378E-01):b := 2.77694281439826E-01+I*(-1.38477506132375E-01):c := 8.23677608645291E-01+I*(-3.94992834249932E-02):d := 2.00077364674771E-01+I*(-3.39781501898827E-01):e := -2.81498262449123E-01+I*(4.68551759764302E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.62361621875894E-01+I*(5.58042524812946E-01):b := -7.30633440807285E-02+I*(-9.53218241661595E-02):c := 1.06167881513836E+00+I*(1.43312046879939E-01):d := 1.36629705339970E-01+I*(-2.95143433548676E-01):e := -1.60280437945384E-01+I*(4.49108850972793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.51071236346119E-01+I*(5.08953611280512E-01):b := -3.69499211647814E-01+I*(-2.87725309494614E-01):c := 1.12648945879767E+00+I*(4.36337877223415E-01):d := 5.93331812218223E-02+I*(-3.01732058621502E-01):e := -5.65779859541389E-02+I*(4.61618534557604E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.40681886794434E-01+I*(2.85770358871403E-01):b := -4.72907684309095E-01+I*(-6.25660233006003E-01):c := 9.87783919164953E-01+I*(7.02468164968372E-01):d := 4.35569501038521E-03+I*(-3.56464486221316E-01):e := 4.60181733971586E-02+I*(5.03093646103716E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.42472642588423E-01+I*(-7.07730820659558E-03):b := -3.34902788449203E-01+I*(-9.51003088261020E-01):c := 7.10464059774718E-01+I*(8.17177590770254E-01):d := -2.57817648931052E-03+I*(-4.33730805190990E-01):e := 1.58499169837860E-01+I*(5.98083130140902E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.55605589190045E-01+I*(-2.32562711888404E-01):b := -2.00585485945521E-02+I*(-1.11152233750277E+00):c := 4.24290924902584E-01+I*(7.26792339443097E-01):d := 4.17760022588411E-02+I*(-4.97377246165130E-01):e := 2.50843285414655E-01+I*(8.34697029138062E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.67517897680365E-01+I*(-2.85178725800182E-01):b := 3.24305916322903E-01+I*(-1.03210924003829E+00):c := 2.63168104815349E-01+I*(4.73604674603054E-01):d := 1.16664418076792E-01+I*(-5.17622932060536E-01):e := -5.00793783439415E-02+I*(1.25171268038709E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.18831628617948E-01+I*(-3.80031415534209E-01):b := 4.32929764202711E-01+I*(-6.96608089272158E-01):c := 1.64106494879871E-01+I*(3.29433067220973E-01):d := 4.46548541490618E-01+I*(-3.21285599433502E-01):e := 4.56357704532452E-01+I*(1.76528453282060E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.16989067546102E-01+I*(-1.05457098319966E-01):b := 4.14521391915146E-01+I*(-3.43685354701956E-01):c := 3.85468986092697E-01+I*(1.26792488204653E-01):d := 4.79490886860615E-01+I*(-2.51050533386536E-01):e := -2.97417123254695E-01+I*(1.11802944265576E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.15466108607466E-01+I*(1.70342168000920E-01):b := 1.73565399658973E-01+I*(-8.51635286550431E-02):c := 6.85297345812652E-01+I*(1.13849865299739E-01):d := 4.59579957254101E-01+I*(-1.76072419891316E-01):e := -1.69654946764199E-01+I*(7.30094165575539E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.68184249839027E-01+I*(3.18316841549489E-01):b := -1.77192225861582E-01+I*(-4.20078466888276E-02):c := 9.23298552305726E-01+I*(2.96661195604671E-01):d := 3.96132297919300E-01+I*(-1.31434351541166E-01):e := -2.21870341492999E-02+I*(5.85194172718528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.56893864309251E-01+I*(2.69227928017054E-01):b := -4.73628093428666E-01+I*(-2.34411332017282E-01):c := 9.88109195965033E-01+I*(5.89687025948147E-01):d := 3.18835773801152E-01+I*(-1.38022976613991E-01):e := 1.04481967359718E-01+I*(5.14833976944882E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.04650451475757E+00+I*(4.60446756079465E-02):b := -5.77036566089948E-01+I*(-5.72346255528671E-01):c := 8.49403656332314E-01+I*(8.55817313693105E-01):d := 2.63858287589715E-01+I*(-1.92755404213806E-01):e := 2.29714431056750E-01+I*(4.76660090486975E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.04829527055156E+00+I*(-2.46802991470053E-01):b := -4.39031670230056E-01+I*(-8.97689110783688E-01):c := 5.72083796942079E-01+I*(9.70526739494987E-01):d := 2.56924416090020E-01+I*(-2.70021723183480E-01):e := 3.78564895310293E-01+I*(4.64530929833822E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.61428217153177E-01+I*(-4.72288395151861E-01):b := -1.24187430375405E-01+I*(-1.05820836002544E+00):c := 2.85910662069945E-01+I*(8.80141488167830E-01):d := 3.01278594838171E-01+I*(-3.33668164157620E-01):e := 5.95059159667716E-01+I*(5.09038366062875E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.73340525643498E-01+I*(-5.24904409063640E-01):b := 2.20177034542049E-01+I*(-9.78795262560960E-01):c := 1.24787841982709E-01+I*(6.26953823327787E-01):d := 3.76167010656122E-01+I*(-3.53913850053026E-01):e := 9.36134921120691E-01+I*(8.14046401040004E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.45803765799962E-01+I*(-6.31693417150250E-01):b := 3.18892848800760E-01+I*(-7.22699968104324E-01):c := -4.04698692566523E-02+I*(3.57956212084593E-01):d := 5.40108891003397E-01+I*(-2.90721156820119E-02):e := 2.12157147746451E+00+I*(-4.02588526863912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43961204728116E-01+I*(-3.57119099936007E-01):b := 3.00484476513194E-01+I*(-3.69777233534122E-01):c := 1.80892621956173E-01+I*(1.55315633068273E-01):d := 5.73051236373393E-01+I*(4.11629503649533E-02):e := 1.68589043579445E+00+I*(3.84890227706989E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.42438245789480E-01+I*(-8.13198336151210E-02):b := 5.95284842570216E-02+I*(-1.11255407487209E-01):c := 4.80720981676128E-01+I*(1.42373010163359E-01):d := 5.53140306766880E-01+I*(1.16141063860174E-01):e := 3.37628180462208E-02+I*(1.46509453426740E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.95156387021041E-01+I*(6.66548399334475E-02):b := -2.91229141263533E-01+I*(-6.80997255209938E-02):c := 7.18722188169202E-01+I*(3.25184340468291E-01):d := 4.89692647432078E-01+I*(1.60779132210324E-01):e := 2.02391585495728E-01+I*(8.71210634451346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.83866001491266E-01+I*(1.75659264010132E-02):b := -5.87665008830618E-01+I*(-2.60503210849448E-01):c := 7.83532831828510E-01+I*(6.18210170811767E-01):d := 4.12396123313930E-01+I*(1.54190507137498E-01):e := 3.40842736661414E-01+I*(6.11012942422271E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.73476651939581E-01+I*(-2.05617326008095E-01):b := -6.91073481491900E-01+I*(-5.98438134360836E-01):c := 6.44827292195791E-01+I*(8.84340458556724E-01):d := 3.57418637102493E-01+I*(9.94580795376838E-02):e := 4.60225552870714E-01+I*(4.38798761842327E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.75267407733570E-01+I*(-4.98464993086095E-01):b := -5.53068585632007E-01+I*(-9.23780989615854E-01):c := 3.67507432805554E-01+I*(9.99049884358606E-01):d := 3.50484765602798E-01+I*(2.21917605680102E-02):e := 5.86420716542246E-01+I*(2.89072340581799E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.88400354335192E-01+I*(-7.23950396767903E-01):b := -2.38224345777357E-01+I*(-1.08430023885760E+00):c := 8.13342979334208E-02+I*(9.08664633031449E-01):d := 3.94838944350950E-01+I*(-4.14546804061297E-02):e := 7.55722343139169E-01+I*(1.24841574451540E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00312662825512E-01+I*(-7.76566410679682E-01):b := 1.06140119140098E-01+I*(-1.00488714139313E+00):c := -7.97885221538147E-02+I*(6.55476968191406E-01):d := 4.69727360168900E-01+I*(-6.17003663015356E-02):e := 1.07020676703701E+00+I*(-1.02159123110915E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.80959608276839E-02+I*(-7.77536289651129E-01):b := 2.48307039873425E-01+I*(-8.15989023161486E-01):c := -2.15518780304550E-01+I*(2.48307056605967E-01):d := 4.23949070105133E-01+I*(2.54915833175010E-01):e := 4.47520425797741E-01+I*(-1.13310349427417E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.37466002441624E-02+I*(-5.02961972436885E-01):b := 2.29898667585859E-01+I*(-4.63066288591284E-01):c := 5.84371090827600E-03+I*(4.56664775896473E-02):d := 4.56891415475130E-01+I*(3.25150899221976E-01):e := -2.70644552541257E-01+I*(-2.14391323335007E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.47304408172016E-02+I*(-2.27162706115999E-01):b := -1.10573246703135E-02+I*(-2.04544462544371E-01):c := 3.05672070628231E-01+I*(3.27238546847332E-02):d := 4.36980485868616E-01+I*(4.00129012717196E-01):e := -7.25116566217177E+00+I*(2.67295141817527E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.77448582048762E-01+I*(-7.91880325674309E-02):b := -3.61814950190868E-01+I*(-1.61388780578155E-01):c := 5.43673277121305E-01+I*(2.15535184989665E-01):d := 3.73532826533815E-01+I*(4.44767081067346E-01):e := 5.54296236943755E-01+I*(2.29356133005957E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.66158196518987E-01+I*(-1.28276946099865E-01):b := -6.58250817757953E-01+I*(-3.53792265906610E-01):c := 6.08483920780612E-01+I*(5.08561015333141E-01):d := 2.96236302415667E-01+I*(4.38178455994521E-01):e := 8.74376207351582E-01+I*(9.19880220312455E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.55768846967302E-01+I*(-3.51460198508973E-01):b := -7.61659290419235E-01+I*(-6.91727189417998E-01):c := 4.69778381147893E-01+I*(7.74691303078098E-01):d := 2.41258816204230E-01+I*(3.83446028394706E-01):e := 8.66665333520937E-01+I*(3.59149645639597E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.57559602761292E-01+I*(-6.44307865586972E-01):b := -6.23654394559342E-01+I*(-1.01707004467301E+00):c := 1.92458521757658E-01+I*(8.89400728879980E-01):d := 2.34324944704535E-01+I*(3.06179709425033E-01):e := 8.20710702266933E-01+I*(-5.67382903526082E-04):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.70692549362913E-01+I*(-8.69793269268781E-01):b := -3.08810154704692E-01+I*(-1.17758929391476E+00):c := -9.37146131144762E-02+I*(7.99015477552823E-01):d := 2.78679123452686E-01+I*(2.42533268450893E-01):e := 7.54912129543012E-01+I*(-3.08929453279900E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.82604857853234E-01+I*(-9.22409283180559E-01):b := 3.55543102127626E-02+I*(-1.09817619645029E+00):c := -2.54837433201711E-01+I*(5.45827812712780E-01):d := 3.53567539270637E-01+I*(2.22287582555487E-01):e := 6.53140134524869E-01+I*(-6.47206473780440E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.32423884799619E-01+I*(-7.49318532130702E-01):b := 2.54200221891691E-01+I*(-9.32824268790037E-01):c := -2.79132907332566E-01+I*(5.17916592481673E-02):d := 1.52421549966734E-01+I*(3.97797129692878E-01):e := -1.71644963800454E-01+I*(-8.08503487470320E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.34266445871465E-01+I*(-4.74744214916459E-01):b := 2.35791849604124E-01+I*(-5.79901534219835E-01):c := -5.77704161197407E-02+I*(-1.50848919768152E-01):d := 1.85363895336731E-01+I*(4.68032195739844E-01):e := -5.32945445570661E-01+I*(-7.67196368841703E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35789404810101E-01+I*(-1.98944948595573E-01):b := -5.16414265204796E-03+I*(-3.21379708172922E-01):c := 2.42057943600214E-01+I*(-1.63791542673066E-01):d := 1.65452965730217E-01+I*(5.43010309235064E-01):e := -1.06393134032218E+00+I*(-6.39417037008059E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.69287364214601E-02+I*(-5.09702750470043E-02):b := -3.55921768172603E-01+I*(-2.78224026206707E-01):c := 4.80059150093288E-01+I*(1.90197876318654E-02):d := 1.02005306395416E-01+I*(5.87648377585214E-01):e := -2.20569622264936E+00+I*(-3.95320406317564E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.05638350891685E-01+I*(-1.00059188579439E-01):b := -6.52357635739687E-01+I*(-4.70627511535161E-01):c := 5.44869793752596E-01+I*(3.12045617975342E-01):d := 2.47087822772680E-02+I*(5.81059752512389E-01):e := -4.33516864030552E-01+I*(6.59246628078371E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.95249001340000E-01+I*(-3.23242440988546E-01):b := -7.55766108400969E-01+I*(-8.08562435046549E-01):c := 4.06164254119876E-01+I*(5.78175905720299E-01):d := -3.02687039341688E-02+I*(5.26327324912574E-01):e := 2.31327011586077E+00+I*(-6.41915428798675E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.97039757133989E-01+I*(-6.16090108066546E-01):b := -6.17761212541076E-01+I*(-1.13390529030157E+00):c := 1.28844394729640E-01+I*(6.92885331522180E-01):d := -3.72025754338644E-02+I*(4.49061005942900E-01):e := 1.07317374694733E+00+I*(-6.78572726286671E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.10172703735611E-01+I*(-8.41575511748355E-01):b := -3.02916972686426E-01+I*(-1.29442453954331E+00):c := -1.57328740142493E-01+I*(6.02500080195024E-01):d := 7.15160331428737E-03+I*(3.85414564968761E-01):e := 5.19189661566872E-01+I*(-7.89134419276006E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.20850122259314E-02+I*(-8.94191525660133E-01):b := 4.14474922310284E-02+I*(-1.21501144207884E+00):c := -3.18451560229728E-01+I*(3.49312415354981E-01):d := 8.20400191322377E-02+I*(3.65168879073354E-01):e := 1.51140906588602E-01+I*(-8.15465655593819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.96930887831566E-01+I*(-5.05914061809342E-01):b := 5.53608870302320E-01+I*(-1.15935684676952E+00):c := -2.09453840607859E-01+I*(3.25067335297220E-01):d := -1.08434864986930E-01+I*(1.05409254031255E-01):e := -8.14327554270050E-01+I*(-1.72227219717424E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.98773448903413E-01+I*(-2.31339744595099E-01):b := 5.35200498014754E-01+I*(-8.06434112199316E-01):c := 1.19086506049668E-02+I*(1.22426756280901E-01):d := -7.54925196169343E-02+I*(1.75644320078220E-01):e := -6.50645785484134E-01+I*(2.36220849699679E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.00296407842049E-01+I*(4.44595217257875E-02):b := 2.94244505758581E-01+I*(-5.47912286152403E-01):c := 3.11737010324922E-01+I*(1.09484133375986E-01):d := -9.54034492234476E-02+I*(2.50622433573441E-01):e := -5.61139257383865E-01+I*(1.80686013581202E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.47578266610488E-01+I*(1.92434195274356E-01):b := -5.65131197619731E-02+I*(-5.04756604186187E-01):c := 5.49738216817995E-01+I*(2.92295463680918E-01):d := -1.58851108558249E-01+I*(2.95260501923591E-01):e := -4.99752216325886E-01+I*(3.36261089338363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41131347859737E-01+I*(1.43345281741922E-01):b := -3.52948987329058E-01+I*(-6.97160089514642E-01):c := 6.14548860477304E-01+I*(5.85321294024395E-01):d := -2.36147632676397E-01+I*(2.88671876850765E-01):e := -4.55253635752574E-01+I*(5.29258217115431E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.30741998308052E-01+I*(-7.98379706671860E-02):b := -4.56357459990340E-01+I*(-1.03509501302603E+00):c := 4.75843320844584E-01+I*(8.51451581769352E-01):d := -2.91125118887834E-01+I*(2.33939449250951E-01):e := -4.49894488583744E-01+I*(8.43573322899412E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.32532754102042E-01+I*(-3.72685637745186E-01):b := -3.18352564130447E-01+I*(-1.36043786828105E+00):c := 1.98523461454348E-01+I*(9.66161007571234E-01):d := -2.98058990387529E-01+I*(1.56673130281277E-01):e := -7.80909664117909E-01+I*(1.55278470259625E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.45665700703663E-01+I*(-5.98171041426994E-01):b := -3.50832427579702E-03+I*(-1.52095711752279E+00):c := -8.76496734177853E-02+I*(8.75775756244077E-01):d := -2.53704811639377E-01+I*(9.30266893071371E-02):e := -2.85905952042335E+00+I*(4.21962760840529E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42421990806016E-01+I*(-6.50787055338773E-01):b := 3.40856140641658E-01+I*(-1.44154402005832E+00):c := -2.48772493505021E-01+I*(6.22588091404034E-01):d := -1.78816395821427E-01+I*(7.27810034117310E-02):e := -1.26004434888952E+00+I*(-4.48354167152760E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.14380617892083E-01+I*(-2.44452135850762E-01):b := 6.69692466340534E-01+I*(-1.17384142291868E+00):c := -2.69704309359106E-02+I*(2.28295109164251E-01):d := -2.96295732616616E-01+I*(-1.37182076194203E-01):e := -5.83235848618262E-01+I*(7.71283688877376E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.16223178963929E-01+I*(3.01221813634817E-02):b := 6.51284094052968E-01+I*(-8.20918688348482E-01):c := 1.94392060276915E-01+I*(2.56545301479318E-02):d := -2.63353387246620E-01+I*(-6.69470101472375E-02):e := -4.58608850053213E-01+I*(1.18245596785403E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.17746137902565E-01+I*(3.05921447684368E-01):b := 4.10328101796796E-01+I*(-5.62396862301569E-01):c := 4.94220419996870E-01+I*(1.27119072430177E-02):d := -2.83264316853134E-01+I*(8.03110334798277E-03):e := -3.86550378575225E-01+I*(1.80390328920351E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.65027996671004E-01+I*(4.53896121232936E-01):b := 5.95704762762414E-02+I*(-5.19241180335353E-01):c := 7.32221626489943E-01+I*(1.95523237547949E-01):d := -3.46711976187935E-01+I*(5.26691716981325E-02):e := -3.42103495232647E-01+I*(2.53482454333415E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.23681617799221E-01+I*(4.04807207700502E-01):b := -2.36865391290844E-01+I*(-7.11644665663808E-01):c := 7.97032270149252E-01+I*(4.88549067891426E-01):d := -4.24008500306083E-01+I*(4.60805466253072E-02):e := -3.20131572638717E-01+I*(3.45322882574957E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13292268247536E-01+I*(1.81623955291394E-01):b := -3.40273863952126E-01+I*(-1.04957958917520E+00):c := 6.58326730516532E-01+I*(7.54679355636383E-01):d := -4.78985986517520E-01+I*(-8.65188097450713E-03):e := -3.39849308903655E-01+I*(4.72981161867583E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.15083024041525E-01+I*(-1.11223711786605E-01):b := -2.02268968092232E-01+I*(-1.37492244443021E+00):c := 3.81006871126296E-01+I*(8.69388781438265E-01):d := -4.85919858017215E-01+I*(-8.59181999441810E-02):e := -4.92042886571686E-01+I*(6.31214715021031E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28215970643147E-01+I*(-3.36709115468414E-01):b := 1.12575271762417E-01+I*(-1.53544169367196E+00):c := 9.48337362541626E-02+I*(7.79003530111108E-01):d := -4.41565679269063E-01+I*(-1.49564640918321E-01):e := -8.53417946264601E-01+I*(5.22840419912960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59871720866533E-01+I*(-3.89325129380193E-01):b := 4.56939736679872E-01+I*(-1.45602859620749E+00):c := -6.62890838330730E-02+I*(5.25815865271065E-01):d := -3.66677263451113E-01+I*(-1.69810326813726E-01):e := -7.97284270970502E-01+I*(1.44986477830561E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.59683400227913E-01+I*(-3.29442101077305E-02):b := 7.67928166103122E-01+I*(-1.11032015476746E+00):c := 1.75023958924746E-01+I*(2.71461357797319E-01):d := -2.84270805057547E-01+I*(-4.43772454719581E-01):e := -4.46162562612231E-01+I*(2.29461780025238E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.61525961299759E-01+I*(2.41630107106513E-01):b := 7.49519793815556E-01+I*(-7.57397420197262E-01):c := 3.96386450137571E-01+I*(6.88207787809990E-02):d := -2.51328459687551E-01+I*(-3.73537388672616E-01):e := -3.53925506374307E-01+I*(2.01852621920546E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.63048920238395E-01+I*(5.17429373427398E-01):b := 5.08563801559383E-01+I*(-4.98875594150349E-01):c := 6.96214809857526E-01+I*(5.58781558760850E-02):d := -2.71239389294064E-01+I*(-2.98559275177395E-01):e := -2.86695315882662E-01+I*(2.17783921892608E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03307790068341E-02+I*(6.65404046975967E-01):b := 1.57806176038828E-01+I*(-4.55719912184134E-01):c := 9.34216016350600E-01+I*(2.38689486181017E-01):d := -3.34687048628866E-01+I*(-2.53921206827245E-01):e := -2.39212467095551E-01+I*(2.52844480294368E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.78378835463391E-01+I*(6.16315133443532E-01):b := -1.38629691528256E-01+I*(-6.48123397512588E-01):c := 9.99026660009907E-01+I*(5.31715316524493E-01):d := -4.11983572747013E-01+I*(-2.60509831900070E-01):e := -2.07204945898384E-01+I*(3.03957952235283E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.67989485911706E-01+I*(3.93131881034425E-01):b := -2.42038164189538E-01+I*(-9.86058321023977E-01):c := 8.60321120377188E-01+I*(7.97845604269450E-01):d := -4.66961058958451E-01+I*(-3.15242259499885E-01):e := -1.97122075239325E-01+I*(3.76971509504641E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.69780241705695E-01+I*(1.00284213956425E-01):b := -1.04033268329645E-01+I*(-1.31140117627899E+00):c := 5.83001260986952E-01+I*(9.12555030071331E-01):d := -4.73894930458146E-01+I*(-3.92508578469559E-01):e := -2.42031452446157E-01+I*(4.73614486528969E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.82913188307317E-01+I*(-1.25201189725383E-01):b := 2.10810971525005E-01+I*(-1.47192042552074E+00):c := 2.96828126114819E-01+I*(8.22169778744175E-01):d := -4.29540751709995E-01+I*(-4.56155019443699E-01):e := -4.00030236735728E-01+I*(5.15578265493839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.17450320236263E-03+I*(-1.77817203637162E-01):b := 5.55175436442460E-01+I*(-1.39250732805627E+00):c := 1.35705306027583E-01+I*(5.68982113904132E-01):d := -3.54652335892044E-01+I*(-4.76400705339105E-01):e := -5.16228028480484E-01+I*(3.60760449943307E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.22378225218742E-03+I*(2.96428063158294E-02):b := 8.02350393902976E-01+I*(-9.98515349644074E-01):c := 3.02013909040726E-01+I*(4.34368113721594E-01):d := -7.79866795567949E-02+I*(-6.70904836060343E-01):e := -3.33582679452085E-01+I*(3.57147815350878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07066343324034E-01+I*(3.04217123530073E-01):b := 7.83942021615410E-01+I*(-6.45592615073872E-01):c := 5.23376400253551E-01+I*(2.31727534705274E-01):d := -4.50443341867988E-02+I*(-6.00669770013378E-01):e := -2.77738051083858E-01+I*(2.84619158883679E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.58930226266934E-03+I*(5.80016389850959E-01):b := 5.42986029359238E-01+I*(-3.87070789026959E-01):c := 8.23204759973506E-01+I*(2.18784911800360E-01):d := -6.49552637933121E-02+I*(-5.25691656518158E-01):e := -2.16095666979476E-01+I*(2.66465226229803E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.44128838968891E-01+I*(7.27991063399527E-01):b := 1.92228403838683E-01+I*(-3.43915107060743E-01):c := 1.06120596646658E+00+I*(4.01596242105292E-01):d := -1.28402923128113E-01+I*(-4.81053588168008E-01):e := -1.65002619722107E-01+I*(2.75653972687283E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.32838453439116E-01+I*(6.78902149867093E-01):b := -1.04207463728402E-01+I*(-5.36318592389198E-01):c := 1.12601661012589E+00+I*(6.94622072448768E-01):d := -2.05699447246261E-01+I*(-4.87642213240833E-01):e := -1.23657937610975E-01+I*(3.02877755338272E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.22449103887431E-01+I*(4.55718897457985E-01):b := -2.07615936389684E-01+I*(-8.74253515900587E-01):c := 9.87311070493168E-01+I*(9.60752360193726E-01):d := -2.60676933457698E-01+I*(-5.42374640840647E-01):e := -9.36175332345812E-02+I*(3.49918088060247E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.24239859681420E-01+I*(1.62871230379986E-01):b := -6.96110405297910E-02+I*(-1.19959637115560E+00):c := 7.09991211102933E-01+I*(1.07546178599561E+00):d := -2.67610804957394E-01+I*(-6.19640959810321E-01):e := -9.00386324738518E-02+I*(4.23738552607472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.37372806283042E-01+I*(-6.26141733018234E-02):b := 2.45233199324860E-01+I*(-1.36011562039735E+00):c := 4.23818076230799E-01+I*(9.85076534668450E-01):d := -2.23256626209242E-01+I*(-6.83287400784461E-01):e := -1.59303716061585E-01+I*(5.07221430638893E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.49285114773362E-01+I*(-1.15230187213602E-01):b := 5.89597664242314E-01+I*(-1.28070252293288E+00):c := 2.62695256143563E-01+I*(7.31888869828407E-01):d := -1.48368210391292E-01+I*(-7.03533086679867E-01):e := -2.99876796741055E-01+I*(4.83745173489148E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.29933752780607E-01+I*(-8.59762471418726E-02):b := 7.56852606792097E-01+I*(-8.90741718437747E-01):c := 2.94579410416675E-01+I*(6.40789495333188E-01):d := 2.26034008971154E-01+I*(-7.12301454691908E-01):e := -2.13767958436805E-01+I*(4.95676798292630E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28091191708761E-01+I*(1.88598070072371E-01):b := 7.38444234504531E-01+I*(-5.37818983867545E-01):c := 5.15941901629500E-01+I*(4.38148916316869E-01):d := 2.58976354341150E-01+I*(-6.42066388644943E-01):e := -2.09547657753448E-01+I*(3.84436864752350E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.26568232770125E-01+I*(4.64397336393256E-01):b := 4.97488242248358E-01+I*(-2.79297157820632E-01):c := 8.15770261349455E-01+I*(4.25206293411954E-01):d := 2.39065424734637E-01+I*(-5.67088275149722E-01):e := -1.56915320822710E-01+I*(3.30404109215941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.79286374001686E-01+I*(6.12372009941825E-01):b := 1.46730616727804E-01+I*(-2.36141475854416E-01):c := 1.05377146784253E+00+I*(6.08017623716886E-01):d := 1.75617765399835E-01+I*(-5.22450206799572E-01):e := -1.02256831910701E-01+I*(3.14391143034308E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.67995988471910E-01+I*(5.63283096409390E-01):b := -1.49705250839281E-01+I*(-4.28544961182871E-01):c := 1.11858211150184E+00+I*(9.01043454060363E-01):d := 9.83212412816874E-02+I*(-5.29038831872397E-01):e := -5.20533011560438E-02+I*(3.20981649883977E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.57606638920226E-01+I*(3.40099844000284E-01):b := -2.53113723500563E-01+I*(-7.66479884694259E-01):c := 9.79876571869118E-01+I*(1.16717374180532E+00):d := 4.33437550702503E-02+I*(-5.83771259472212E-01):e := -6.10520970875994E-03+I*(3.48010999470993E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.59397394714215E-01+I*(4.72521769222835E-02):b := -1.15108827640670E-01+I*(-1.09182273994928E+00):c := 7.02556712478882E-01+I*(1.28188316760720E+00):d := 3.64098835705551E-02+I*(-6.61037578441886E-01):e := 3.00369296348212E-02+I*(4.03664028906154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.72530341315837E-01+I*(-1.78233226759525E-01):b := 1.99735412213980E-01+I*(-1.25234198919102E+00):c := 4.16383577606748E-01+I*(1.19149791628005E+00):d := 8.07640623187068E-02+I*(-7.24684019416026E-01):e := 2.48118315273368E-02+I*(4.98719717137408E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.84442649806157E-01+I*(-2.30849240671304E-01):b := 5.44099877131435E-01+I*(-1.17292889172655E+00):c := 2.55260757519513E-01+I*(9.38310251440002E-01):d := 1.55652478136657E-01+I*(-7.44929705311432E-01):e := -8.88530335893281E-02+I*(5.74844773160147E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.35756380743740E-01+I*(-3.25701930405330E-01):b := 6.52723725011243E-01+I*(-8.37427740960415E-01):c := 1.56199147584035E-01+I*(7.94138644057921E-01):d := 4.85536601550484E-01+I*(-5.48592372684397E-01):e := -4.53451002827589E-02+I*(6.95184243886149E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.33913819671893E-01+I*(-5.11276131910871E-02):b := 6.34315352723678E-01+I*(-4.84505006390213E-01):c := 3.77561638796861E-01+I*(5.91498065041601E-01):d := 5.18478946920480E-01+I*(-4.78357306637432E-01):e := -1.40601367367664E-01+I*(5.39137981514110E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.32390860733257E-01+I*(2.24671653129799E-01):b := 3.93359360467505E-01+I*(-2.25983180343300E-01):c := 6.77389998516816E-01+I*(5.78555442136687E-01):d := 4.98568017313967E-01+I*(-4.03379193142211E-01):e := -1.03882258535444E-01+I*(4.29218327906103E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.85109001964818E-01+I*(3.72646326678368E-01):b := 4.26017349469504E-02+I*(-1.82827498377084E-01):c := 9.15391205009890E-01+I*(7.61366772441619E-01):d := 4.35120357979166E-01+I*(-3.58741124792061E-01):e := -4.28877752780964E-02+I*(3.78612528253549E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.73818616435043E-01+I*(3.23557413145933E-01):b := -2.53834132620134E-01+I*(-3.75230983705539E-01):c := 9.80201848669197E-01+I*(1.05439260278510E+00):d := 3.57823833861018E-01+I*(-3.65329749864886E-01):e := 1.92631258086236E-02+I*(3.60383114187155E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06342926688336E+00+I*(1.00374160736826E-01):b := -3.57242605281416E-01+I*(-7.13165907216927E-01):c := 8.41496309036478E-01+I*(1.32052289053005E+00):d := 3.02846347649580E-01+I*(-4.20062177464701E-01):e := 8.27404504143349E-02+I*(3.65298879538112E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.06522002267735E+00+I*(-1.92473506341174E-01):b := -2.19237709421523E-01+I*(-1.03850876247194E+00):c := 5.64176449646242E-01+I*(1.43523231633193E+00):d := 2.95912476149885E-01+I*(-4.97328496434375E-01):e := 1.49834578047169E-01+I*(3.99371531185402E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.78352969278969E-01+I*(-4.17958910022983E-01):b := 9.56065304331271E-02+I*(-1.19902801171369E+00):c := 2.78003314774108E-01+I*(1.34484706500478E+00):d := 3.40266654898037E-01+I*(-5.60974937408515E-01):e := 2.08644979960089E-01+I*(4.88403577017864E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.90265277769289E-01+I*(-4.70574923934761E-01):b := 4.39970995350582E-01+I*(-1.11961491424922E+00):c := 1.16880494686873E-01+I*(1.09165940016473E+00):d := 4.15155070715987E-01+I*(-5.81220623303921E-01):e := 1.72533135618560E-01+I*(6.53601272492754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.62728517925754E-01+I*(-5.77363932021372E-01):b := 5.38686809609292E-01+I*(-8.63519619792581E-01):c := -4.83772165524881E-02+I*(8.22661788921541E-01):d := 5.79096951063263E-01+I*(-2.56378888932907E-01):e := 3.13835013880166E-01+I*(1.14057194592437E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.60885956853908E-01+I*(-3.02789614807129E-01):b := 5.20278437321726E-01+I*(-5.10596885222379E-01):c := 1.72985274660337E-01+I*(6.20021209905221E-01):d := 6.12039296433259E-01+I*(-1.86143822885942E-01):e := -1.06363873558317E-01+I*(8.80510967722593E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.59362997915272E-01+I*(-2.69903484862425E-02):b := 2.79322445065554E-01+I*(-2.52075059175466E-01):c := 4.72813634380292E-01+I*(6.07078587000307E-01):d := 5.92128366826746E-01+I*(-1.11165709390722E-01):e := -8.41773318204795E-02+I*(6.20058030982034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.12081139146833E-01+I*(1.20984325062326E-01):b := -7.14351804550011E-02+I*(-2.08919377209251E-01):c := 7.10814840873366E-01+I*(7.89889917305239E-01):d := 5.28680707491944E-01+I*(-6.65276410405719E-02):e := 5.62735148399664E-03+I*(5.02340136951224E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.00790753617057E-01+I*(7.18954115298915E-02):b := -3.67871048022086E-01+I*(-4.01322862537705E-01):c := 7.75625484532674E-01+I*(1.08291574764872E+00):d := 4.51384183373796E-01+I*(-7.31162661133974E-02):e := 9.62459060230663E-02+I*(4.44358260278673E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.90401404065373E-01+I*(-1.51287840879216E-01):b := -4.71279520683368E-01+I*(-7.39257786049094E-01):c := 6.36919944899954E-01+I*(1.34904603539367E+00):d := 3.96406697162359E-01+I*(-1.27848693713212E-01):e := 1.90248082393363E-01+I*(4.16473558038110E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.92192159859362E-01+I*(-4.44135507957216E-01):b := -3.33274624823475E-01+I*(-1.06460064130411E+00):c := 3.59600085509719E-01+I*(1.46375546119555E+00):d := 3.89472825662664E-01+I*(-2.05115012682886E-01):e := 3.01003810209576E-01+I*(4.16122892950857E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.05325106460983E-01+I*(-6.69620911639025E-01):b := -1.84303849688244E-02+I*(-1.22511989054586E+00):c := 7.34269506375847E-02+I*(1.37337020986840E+00):d := 4.33827004410816E-01+I*(-2.68761453657025E-01):e := 4.48153345157635E-01+I*(4.72218646264064E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.17237414951304E-01+I*(-7.22236925550803E-01):b := 3.25934079948630E-01+I*(-1.14570679308138E+00):c := -8.76958694496505E-02+I*(1.12018254502835E+00):d := 5.08715420228766E-01+I*(-2.89007139552431E-01):e := 6.07564817437378E-01+I*(7.10445040193585E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.50207129534757E-02+I*(-7.23206804522250E-01):b := 4.68101000681957E-01+I*(-9.56808674849743E-01):c := -2.23426127600386E-01+I*(7.13012633442915E-01):d := 4.62937130164999E-01+I*(2.76090599241150E-02):e := 2.94579306749884E+00+I*(5.73730646606150E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.68218481183708E-02+I*(-4.48632487308007E-01):b := 4.49692628394391E-01+I*(-6.03885940279540E-01):c := -2.06363638756004E-03+I*(5.10372054426595E-01):d := 4.95879475534996E-01+I*(9.78441259710804E-02):e := -1.03492810911977E+00+I*(1.58562475332983E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.16551929429932E-02+I*(-1.72833220987121E-01):b := 2.08736636138219E-01+I*(-3.45364114232627E-01):c := 2.97764723332395E-01+I*(4.97429431521681E-01):d := 4.75968545928482E-01+I*(1.72822239466301E-01):e := -3.84816892175942E-01+I*(9.46790809239522E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.94373334174554E-01+I*(-2.48585474385522E-02):b := -1.42020989382336E-01+I*(-3.02208432266412E-01):c := 5.35765929825468E-01+I*(6.80240761826613E-01):d := 4.12520886593681E-01+I*(2.17460307816451E-01):e := -7.52836328550366E-02+I*(7.53909959853628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.83082948644779E-01+I*(-7.39474609709867E-02):b := -4.38456856949421E-01+I*(-4.94611917594867E-01):c := 6.00576573484776E-01+I*(9.73266592170089E-01):d := 3.35224362475533E-01+I*(2.10871682743625E-01):e := 1.37775330693254E-01+I*(6.49919275763978E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.72693599093094E-01+I*(-2.97130713380094E-01):b := -5.41865329610703E-01+I*(-8.32546841106255E-01):c := 4.61871033852057E-01+I*(1.23939687991505E+00):d := 2.80246876264096E-01+I*(1.56139255143811E-01):e := 3.30246450868199E-01+I*(5.73505572836085E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.74484354887083E-01+I*(-5.89978380458094E-01):b := -4.03860433750810E-01+I*(-1.15788969636127E+00):c := 1.84551174461822E-01+I*(1.35410630571693E+00):d := 2.73313004764401E-01+I*(7.88729361741369E-02):e := 5.52860195759772E-01+I*(5.04043669216385E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.87617301488705E-01+I*(-8.15463784139902E-01):b := -8.90161938961595E-02+I*(-1.31840894560302E+00):c := -1.01621960410312E-01+I*(1.26372105438977E+00):d := 3.17667183512552E-01+I*(1.52264951999970E-02):e := 8.96654318398443E-01+I*(4.33530604785876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.99529609979026E-01+I*(-8.68079798051681E-01):b := 2.55348271021294E-01+I*(-1.23899584813854E+00):c := -2.62744780497547E-01+I*(1.01053338954973E+00):d := 3.92555599330503E-01+I*(-5.01919069540901E-03):e := 1.73643199697185E+00+I*(4.35468874449288E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.15499132673827E-01+I*(-6.94989047001823E-01):b := 4.73994182700223E-01+I*(-1.07364392047829E+00):c := -2.87040254628402E-01+I*(5.16497236085115E-01):d := 1.91409610026601E-01+I*(1.70490356441983E-01):e := -1.54531996221414E+00+I*(-9.04603689296407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.17341693745673E-01+I*(-4.20414729787580E-01):b := 4.55585810412657E-01+I*(-7.20721185908092E-01):c := -6.56777634155768E-02+I*(3.13856657068796E-01):d := 2.24351955396597E-01+I*(2.40725422488948E-01):e := -1.18760924666226E+00+I*(3.13237945353373E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.18864652684309E-01+I*(-1.44615463466694E-01):b := 2.14629818156484E-01+I*(-4.62199359861179E-01):c := 2.34150596304378E-01+I*(3.00914034163882E-01):d := 2.04441025790083E-01+I*(3.15703535984168E-01):e := -8.48884632660950E-01+I*(4.48205457250361E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.38534885472517E-02+I*(3.35921008187450E-03):b := -1.36127807364071E-01+I*(-4.19043677894963E-01):c := 4.72151802797452E-01+I*(4.83725364468813E-01):d := 1.40993366455282E-01+I*(3.60341604334318E-01):e := -5.40370469885422E-01+I*(7.05761162269123E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.22563103017477E-01+I*(-4.57297034505601E-02):b := -4.32563674931155E-01+I*(-6.11447163223418E-01):c := 5.36962446456760E-01+I*(7.76751194812290E-01):d := 6.36968423371339E-02+I*(3.53752979261493E-01):e := -2.06467042607495E-01+I*(9.02987255354117E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.12173753465792E-01+I*(-2.68912955859668E-01):b := -5.35972147592437E-01+I*(-9.49382086734806E-01):c := 3.98256906824040E-01+I*(1.04288148255725E+00):d := 8.71935612569693E-03+I*(2.99020551661678E-01):e := 2.42030894395232E-01+I*(1.06959475685576E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.13964509259781E-01+I*(-5.61760622937667E-01):b := -3.97967251732544E-01+I*(-1.27472494198982E+00):c := 1.20937047433804E-01+I*(1.15759090835913E+00):d := 1.78548462600184E-03+I*(2.21754232692005E-01):e := 1.03551618230670E+00+I*(1.14383456394407E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27097455861403E-01+I*(-7.87246026619476E-01):b := -8.31230118778942E-02+I*(-1.43524419123157E+00):c := -1.65236087438329E-01+I*(1.06720565703197E+00):d := 4.61396633741535E-02+I*(1.58107791717865E-01):e := 2.84105672460668E+00+I*(1.37443708932327E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.90097643517233E-02+I*(-8.39862040531254E-01):b := 2.61241453039560E-01+I*(-1.35583109376710E+00):c := -3.26358907525565E-01+I*(8.14017992191929E-01):d := 1.21028079192104E-01+I*(1.37862105822459E-01):e := -1.35566382860573E-01+I*(-3.51357935818874E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.38363814642819E-01+I*(-6.83365197278261E-01):b := 1.08970972827253E+00+I*(-8.27982115353969E-01):c := -7.90970918747454E-01+I*(3.70261341275104E-01):d := -1.44604334970865E-02+I*(2.07061176350567E-01):e := -1.33139187065331E+00+I*(4.72563472723216E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.40206375714666E-01+I*(-4.08790880064017E-01):b := 1.07130135598496E+00+I*(-4.75059380783767E-01):c := -5.69608427534628E-01+I*(1.67620762258784E-01):d := 1.84819118729093E-02+I*(2.77296242397533E-01):e := -7.62341924704723E-01+I*(4.01831126902026E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.41729334653302E-01+I*(-1.32991613743131E-01):b := 8.30345363728792E-01+I*(-2.16537554736854E-01):c := -2.69780067814673E-01+I*(1.54678139353870E-01):d := -1.42901773360393E-03+I*(3.52274355892753E-01):e := -4.95099426743716E-01+I*(4.49892393168284E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.89011193421741E-01+I*(1.49830598054374E-02):b := 4.79587738208237E-01+I*(-1.73381872770639E-01):c := -3.17788613215993E-02+I*(3.37489469658802E-01):d := -6.48766770684056E-02+I*(3.96912424242903E-01):e := -3.16080226823219E-01+I*(5.13626390655940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.01578951516134E-04+I*(-3.41058537269972E-02):b := 1.83151870641152E-01+I*(-3.65785358099094E-01):c := 3.30317823377087E-02+I*(6.30515300002278E-01):d := -1.42173201186554E-01+I*(3.90323799170078E-01):e := -1.60636747006698E-01+I*(5.92888569546805E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.89309071496799E-01+I*(-2.57289106136105E-01):b := 7.97433979798702E-02+I*(-7.03720281610482E-01):c := -1.05673757295011E-01+I*(8.96645587747235E-01):d := -1.97150687397991E-01+I*(3.35591371570263E-01):e := 8.14614085135687E-03+I*(7.09988008472660E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.91099827290788E-01+I*(-5.50136773214104E-01):b := 2.17748293839763E-01+I*(-1.02906313686550E+00):c := -3.82993616685246E-01+I*(1.01135501354912E+00):d := -2.04084558897686E-01+I*(2.58325052600589E-01):e := 2.35471212243304E-01+I*(9.41757377784307E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23277389241009E-03+I*(-7.75622176895913E-01):b := 5.32592533694414E-01+I*(-1.18958238610725E+00):c := -6.69166751557380E-01+I*(9.20969762221961E-01):d := -1.59730380149534E-01+I*(1.94678611626449E-01):e := 5.27606535364435E-01+I*(1.70257604464265E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.83854917617269E-01+I*(-8.28238190807691E-01):b := 8.76956998611868E-01+I*(-1.11016928864277E+00):c := -8.30289571644616E-01+I*(6.67782097381918E-01):d := -8.48419643315834E-02+I*(1.74432925731043E-01):e := -2.09627652048634E+00+I*(2.50949776079484E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.55813544703336E-01+I*(-4.21903271319680E-01):b := 1.20579332431074E+00+I*(-8.42466691503135E-01):c := -6.08487509075505E-01+I*(2.73489115142135E-01):d := -2.02321301126773E-01+I*(-3.55301538748904E-02):e := -6.23846766137842E-01+I*(3.75456910748344E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.57656105775182E-01+I*(-1.47328954105437E-01):b := 1.18738495202318E+00+I*(-4.89543956932934E-01):c := -3.87125017862680E-01+I*(7.08485361258156E-02):d := -1.69378955756777E-01+I*(3.47049121720749E-02):e := -4.53807161083534E-01+I*(2.99107961921251E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.59179064713818E-01+I*(1.28470312215449E-01):b := 9.46428959767006E-01+I*(-2.31022130886020E-01):c := -8.72966581427250E-02+I*(5.79059132209012E-02):d := -1.89289885363290E-01+I*(1.09683025667295E-01):e := -3.37216617127189E-01+I*(3.08158672108211E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.06460923482257E-01+I*(2.76444985764018E-01):b := 5.95671334246451E-01+I*(-1.87866448919805E-01):c := 1.50704548350349E-01+I*(2.40717243525833E-01):d := -2.52737544698092E-01+I*(1.54321094017445E-01):e := -2.53030992802243E-01+I*(3.45693983617926E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.77513090120325E-02+I*(2.27356072231583E-01):b := 2.99235466679367E-01+I*(-3.80269934248260E-01):c := 2.15515192009657E-01+I*(5.33743073869310E-01):d := -3.30034068816239E-01+I*(1.47732468944620E-01):e := -1.85308679441516E-01+I*(4.04680496131687E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.71859341436283E-01+I*(4.17281982247546E-03):b := 1.95826994018085E-01+I*(-7.18204857759648E-01):c := 7.68096523769373E-02+I*(7.99873361614267E-01):d := -3.85011555027676E-01+I*(9.30000413448053E-02):e := -1.30665424698581E-01+I*(4.97685693571037E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.73650097230272E-01+I*(-2.88674847255524E-01):b := 3.33831889877977E-01+I*(-1.04354771301466E+00):c := -2.00510207013298E-01+I*(9.14582787416149E-01):d := -3.91945426527372E-01+I*(1.57337223751314E-02):e := -1.16461183976335E-01+I*(6.59327189715745E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32169561681064E-02+I*(-5.14160250937333E-01):b := 6.48676129732628E-01+I*(-1.20406696225641E+00):c := -4.86683341885432E-01+I*(8.24197536088992E-01):d := -3.47591247779220E-01+I*(-4.79127185990086E-02):e := -3.03335864358902E-01+I*(8.89257044519791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.01304647677786E-01+I*(-5.66776264849111E-01):b := 9.93040594650083E-01+I*(-1.12465386479194E+00):c := -6.47806161972668E-01+I*(5.71009871248949E-01):d := -2.72702831961270E-01+I*(-6.81584044944144E-02):e := -7.08065171709792E-01+I*(7.08481150876347E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.01116327039166E-01+I*(-2.10395345576649E-01):b := 1.30402902407333E+00+I*(-7.78945423351916E-01):c := -4.06493119214850E-01+I*(3.16655363775202E-01):d := -1.90296373567703E-01+I*(-3.42120532400269E-01):e := -3.56140358294004E-01+I*(3.93563646816374E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02958888111012E-01+I*(6.41789716375940E-02):b := 1.28562065178577E+00+I*(-4.26022688781713E-01):c := -1.85130628002024E-01+I*(1.14014784758883E-01):d := -1.57354028197707E-01+I*(-2.71885466353303E-01):e := -2.93574599693404E-01+I*(3.07619919007381E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.04481847049648E-01+I*(3.39978237958480E-01):b := 1.04466465952959E+00+I*(-1.67500862734800E-01):c := 1.14697731717931E-01+I*(1.01072161853968E-01):d := -1.77264957804221E-01+I*(-1.96907352858083E-01):e := -2.24399702693524E-01+I*(2.85277550052730E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.51763705818087E-01+I*(4.87952911507048E-01):b := 6.93907034009039E-01+I*(-1.24345180768585E-01):c := 3.52698938211005E-01+I*(2.83883492158900E-01):d := -2.40712617139022E-01+I*(-1.52269284507933E-01):e := -1.67239888045712E-01+I*(2.93432350541610E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.36945908652137E-01+I*(4.38863997974614E-01):b := 3.97471166441954E-01+I*(-3.16748666097040E-01):c := 4.17509581870313E-01+I*(5.76909322502377E-01):d := -3.18009141257170E-01+I*(-1.58857909580758E-01):e := -1.20226812959706E-01+I*(3.21079810655202E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.26556559100453E-01+I*(2.15680745565506E-01):b := 2.94062693780672E-01+I*(-6.54683589608429E-01):c := 2.78804042237593E-01+I*(8.43039610247334E-01):d := -3.72986627468607E-01+I*(-2.13590337180573E-01):e := -8.37703626903076E-02+I*(3.70388125310878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.28347314894442E-01+I*(-7.71669215124931E-02):b := 4.32067589640565E-01+I*(-9.80026444863445E-01):c := 1.48418284735779E-03+I*(9.57749036049215E-01):d := -3.79920498968302E-01+I*(-2.90856656150247E-01):e := -7.25701977793148E-02+I*(4.51389201085736E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41480261496064E-01+I*(-3.02652325194302E-01):b := 7.46911829495216E-01+I*(-1.14054569410519E+00):c := -2.84688952024776E-01+I*(8.67363784722059E-01):d := -3.35566320220151E-01+I*(-3.54503097124387E-01):e := -1.40738815174224E-01+I*(5.53829941941276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.46607430013616E-01+I*(-3.55268339106080E-01):b := 1.09127629441267E+00+I*(-1.06113259664072E+00):c := -4.45811772112012E-01+I*(6.14176119882016E-01):d := -2.60677904402201E-01+I*(-3.74748783019793E-01):e := -3.08033737621141E-01+I*(5.41748829106526E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.46656709063440E-01+I*(-1.47808329153089E-01):b := 1.33845125187319E+00+I*(-6.67140618228525E-01):c := -2.79503169098869E-01+I*(4.79562119699478E-01):d := 1.59877519330491E-02+I*(-5.69252913741031E-01):e := -1.88507053551185E-01+I*(4.20313625677816E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.48499270135287E-01+I*(1.26765988061154E-01):b := 1.32004287958562E+00+I*(-3.14217883658324E-01):c := -5.81406778860437E-02+I*(2.76921540683158E-01):d := 4.89300973030449E-02+I*(-4.99017847694065E-01):e := -1.84081947255143E-01+I*(3.37097816001811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.50022229073923E-01+I*(4.02565254382040E-01):b := 1.07908688732945E+00+I*(-5.56960576114106E-02):c := 2.41687681833911E-01+I*(2.63978917778244E-01):d := 2.90191676965316E-02+I*(-4.24039734198845E-01):e := -1.42430055880688E-01+I*(2.94953767081412E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02695912157638E-01+I*(5.50539927930608E-01):b := 7.28329261808893E-01+I*(-1.25403756451950E-02):c := 4.79688888326985E-01+I*(4.46790248083176E-01):d := -3.44284916382699E-02+I*(-3.79401665848695E-01):e := -9.77860939999291E-02+I*(2.83061095424213E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91405526627863E-01+I*(5.01451014398174E-01):b := 4.31893394241808E-01+I*(-2.04943860973650E-01):c := 5.44499531986293E-01+I*(7.39816078426652E-01):d := -1.11725015756418E-01+I*(-3.85990290921521E-01):e := -5.67075047751271E-02+I*(2.90564299161219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.81016177076178E-01+I*(2.78267761989066E-01):b := 3.28484921580526E-01+I*(-5.42878784485039E-01):c := 4.05793992353574E-01+I*(1.00594636617161E+00):d := -1.66702501967855E-01+I*(-4.40722718521335E-01):e := -2.05570382203881E-02+I*(3.15892763569907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.82806932870167E-01+I*(-1.45799050889331E-02):b := 4.66489817440419E-01+I*(-8.68221639740055E-01):c := 1.28474132963338E-01+I*(1.12065579197349E+00):d := -1.73636373467550E-01+I*(-5.17989037491009E-01):e := 3.79701836820898E-03+I*(3.64476970864218E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.95939879471789E-01+I*(-2.40065308770742E-01):b := 7.81334057295070E-01+I*(-1.02874088898180E+00):c := -1.57699001908796E-01+I*(1.03027054064633E+00):d := -1.29282194719398E-01+I*(-5.81635478465149E-01):e := -1.06197999043784E-02+I*(4.38362906323674E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.07852187962110E-01+I*(-2.92681322682520E-01):b := 1.12569852221252E+00+I*(-9.49327791517327E-01):c := -3.18821821996032E-01+I*(7.77082875806292E-01):d := -5.43937789014478E-02+I*(-6.01881164360555E-01):e := -1.02057125519881E-01+I*(4.83855543243188E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.85008259693546E-02+I*(-2.63427382610791E-01):b := 1.29295346476231E+00+I*(-5.59366987022198E-01):c := -2.86937667722920E-01+I*(6.85983501311072E-01):d := 3.20008440460998E-01+I*(-6.10649532372596E-01):e := -4.66212042670015E-02+I*(4.52564394333148E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.33417351024919E-02+I*(1.11469346034516E-02):b := 1.27454509247474E+00+I*(-2.06444252451996E-01):c := -6.55751765100948E-02+I*(4.83342922294753E-01):d := 3.52950785830994E-01+I*(-5.40414466325630E-01):e := -8.93280313828008E-02+I*(3.80514873859035E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.51353059588717E-02+I*(2.86946200924338E-01):b := 1.03358910021857E+00+I*(5.20775735949165E-02):c := 2.34253183209860E-01+I*(4.70400299389838E-01):d := 3.33039856224481E-01+I*(-4.65436352830410E-01):e := -7.24367686221244E-02+I*(3.22126397499888E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.37853447190433E-01+I*(4.34920874472906E-01):b := 6.82831474698013E-01+I*(9.52332555611322E-02):c := 4.72254389702934E-01+I*(6.53211629694770E-01):d := 2.69592196889679E-01+I*(-4.20798284480259E-01):e := -3.71988829970138E-02+I*(2.92731284875396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.26563061660657E-01+I*(3.85831960940472E-01):b := 3.86395607130929E-01+I*(-9.71702297673226E-02):c := 5.37065033362242E-01+I*(9.46237460038246E-01):d := 1.92295672771531E-01+I*(-4.27386909553085E-01):e := 1.29789754531660E-03+I*(2.84006429051247E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.16173712108972E-01+I*(1.62648708531364E-01):b := 2.82987134469647E-01+I*(-4.35105153278711E-01):c := 3.98359493729522E-01+I*(1.21236774778320E+00):d := 1.37318186560094E-01+I*(-4.82119337152900E-01):e := 3.98742020688531E-02+I*(2.92362280563181E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.17964467902962E-01+I*(-1.30198958546635E-01):b := 4.20992030329539E-01+I*(-7.60448008533728E-01):c := 1.21039634339288E-01+I*(1.32707717358508E+00):d := 1.30384315060398E-01+I*(-5.59385656122574E-01):e := 7.53873882789162E-02+I*(3.21412408288808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.31097414504584E-01+I*(-3.55684362228443E-01):b := 7.35836270184191E-01+I*(-9.20967257775476E-01):c := -1.65133500532846E-01+I*(1.23669192225793E+00):d := 1.74738493808551E-01+I*(-6.23032097096714E-01):e := 9.28426245068288E-02+I*(3.79619629301005E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.43009722994905E-01+I*(-4.08300376140222E-01):b := 1.08020073510164E+00+I*(-8.41554160311000E-01):c := -3.26256320620082E-01+I*(9.83504257417886E-01):d := 2.49626909626501E-01+I*(-6.43277782992120E-01):e := 5.08620569267086E-02+I*(4.52075142235265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.94323453932486E-01+I*(-5.03153065874249E-01):b := 1.18882458298145E+00+I*(-5.06053009544867E-01):c := -4.25317930555560E-01+I*(8.39332650035805E-01):d := 5.79511033040328E-01+I*(-4.46940450365085E-01):e := 1.07780342160345E-01+I*(4.98127407443259E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.24808928606401E-02+I*(-2.28578748660006E-01):b := 1.17041621069389E+00+I*(-1.53130274974664E-01):c := -2.03955439342734E-01+I*(6.36692071019485E-01):d := 6.12453378410324E-01+I*(-3.76705384318119E-01):e := 1.12254137377253E-02+I*(4.49752329304859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.90957933922004E-01+I*(4.72205176608802E-02):b := 9.29460218437716E-01+I*(1.05391551072249E-01):c := 9.58729203772208E-02+I*(6.23749448114571E-01):d := 5.92542448803811E-01+I*(-3.01727270822899E-01):e := -3.36757794718148E-03+I*(3.72234508440074E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.43676075153565E-01+I*(1.95195191209449E-01):b := 5.78702592917160E-01+I*(1.48547233038464E-01):c := 3.33874126870295E-01+I*(8.06560778419503E-01):d := 5.29094789469009E-01+I*(-2.57089202472749E-01):e := 2.21554654615456E-02+I*(3.21772153825266E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.32385689623789E-01+I*(1.46106277677014E-01):b := 2.82266725350076E-01+I*(-4.38562522899904E-02):c := 3.98684770529603E-01+I*(1.09958660876298E+00):d := 4.51798265350861E-01+I*(-2.63677827545574E-01):e := 5.96173291629721E-02+I*(2.95446293144010E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.21996340072104E-01+I*(-7.70769747320935E-02):b := 1.78858252688794E-01+I*(-3.81791175801379E-01):c := 2.59979230896883E-01+I*(1.36571689650794E+00):d := 3.96820779139424E-01+I*(-3.18410255145389E-01):e := 1.02159070758037E-01+I*(2.87386901796892E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.23787095866094E-01+I*(-3.69924641810093E-01):b := 3.16863148548686E-01+I*(-7.07134031056396E-01):c := -1.73406284933528E-02+I*(1.48042632230982E+00):d := 3.89886907639729E-01+I*(-3.95676574115063E-01):e := 1.48678102492419E-01+I*(2.99208126419830E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.36920042467716E-01+I*(-5.95410045491901E-01):b := 6.31707388403337E-01+I*(-8.67653280298144E-01):c := -3.03513763365486E-01+I*(1.39004107098266E+00):d := 4.34241086387880E-01+I*(-4.59323015089203E-01):e := 1.92836983850204E-01+I*(3.42524331825533E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.48832350958037E-01+I*(-6.48026059403680E-01):b := 9.76071853320792E-01+I*(-7.88240182833668E-01):c := -4.64636583452722E-01+I*(1.13685340614262E+00):d := 5.09129502205831E-01+I*(-4.79568700984609E-01):e := 1.98876233597157E-01+I*(4.30033938716425E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.21295591114500E-01+I*(-7.54815067490290E-01):b := 1.07478766757950E+00+I*(-5.32144888377033E-01):c := -6.29894294692083E-01+I*(8.67855794899424E-01):d := 6.73071382553106E-01+I*(-1.54726966613595E-01):e := 3.28858248080137E-01+I*(5.83713422793503E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.94530300426542E-02+I*(-4.80240750276047E-01):b := 1.05637929529194E+00+I*(-1.79222153806831E-01):c := -4.08531803479258E-01+I*(6.65215215883104E-01):d := 7.06013727923102E-01+I*(-8.44919005666298E-02):e := 1.37471681393167E-01+I*(5.91189483136990E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.17930071104018E-01+I*(-2.04441483955161E-01):b := 8.15423303035764E-01+I*(7.92996722400824E-02):c := -1.08703443759303E-01+I*(6.52272592978190E-01):d := 6.86102798316589E-01+I*(-9.51378707140935E-03):e := 6.71907975821509E-02+I*(4.73813238959906E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70648212335579E-01+I*(-5.64668104065925E-02):b := 4.64665677515209E-01+I*(1.22455354206298E-01):c := 1.29297762733771E-01+I*(8.35083923283122E-01):d := 6.22655138981787E-01+I*(3.51242812787405E-02):e := 8.27726107229620E-02+I*(3.86168617930699E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.59357826805804E-01+I*(-1.05555723939027E-01):b := 1.68229809948124E-01+I*(-6.99481311221568E-02):c := 1.94108406393079E-01+I*(1.12810975362660E+00):d := 5.45358614863640E-01+I*(2.85356562059154E-02):e := 1.23417923217555E-01+I*(3.33893878507515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.48968477254119E-01+I*(-3.28738976348135E-01):b := 6.48213372868422E-02+I*(-4.07883054633545E-01):c := 5.54028667603587E-02+I*(1.39424004137156E+00):d := 4.90381128652203E-01+I*(-2.61967713938987E-02):e := 1.74471474387364E-01+I*(3.04609421399515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.50759233048109E-01+I*(-6.21586643426134E-01):b := 2.02826233146734E-01+I*(-7.33225909888563E-01):c := -2.21916992629876E-01+I*(1.50894946717344E+00):d := 4.83447257152507E-01+I*(-1.03463090363573E-01):e := 2.36426362479047E-01+I*(2.95683407044576E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.63892179649730E-01+I*(-8.47072047107943E-01):b := 5.17670473001385E-01+I*(-8.93745159130310E-01):c := -5.08090127502010E-01+I*(1.41856421584628E+00):d := 5.27801435900659E-01+I*(-1.67109531337713E-01):e := 3.12520942125566E-01+I*(3.19261555223000E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.75804488140051E-01+I*(-8.99688061019722E-01):b := 8.62034937918840E-01+I*(-8.14332061665835E-01):c := -6.69212947589246E-01+I*(1.16537655100624E+00):d := 6.02689851718609E-01+I*(-1.87355217233119E-01):e := 3.84000878875565E-01+I*(4.14220053887704E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.64122138577776E-02+I*(-9.00657939991168E-01):b := 1.00420185865217E+00+I*(-6.25433943434194E-01):c := -8.04943205739981E-01+I*(7.58206639420799E-01):d := 5.56911561654843E-01+I*(1.29260982243427E-01):e := 8.00028966622356E-01+I*(8.60948189643720E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.98254774929624E-01+I*(-6.26083622776925E-01):b := 9.85793486364601E-01+I*(-2.72511208863992E-01):c := -5.83580714527155E-01+I*(5.55566060404479E-01):d := 5.89853907024839E-01+I*(1.99496048290393E-01):e := 2.41772422646126E-01+I*(1.02075904001142E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.97777338682600E-02+I*(-3.50284356456039E-01):b := 7.44837494108429E-01+I*(-1.39893828170789E-02):c := -2.83752354807200E-01+I*(5.42623437499565E-01):d := 5.69942977418326E-01+I*(2.74474161785613E-01):e := 7.15214994645144E-02+I*(7.11292170570397E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52940407363301E-01+I*(-2.02309682907471E-01):b := 3.94079868587874E-01+I*(2.91662991491364E-02):c := -4.57511483141260E-02+I*(7.25434767804496E-01):d := 5.06495318083524E-01+I*(3.19112230135763E-01):e := 1.11686014329880E-01+I*(5.32538154491897E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.41650021833526E-01+I*(-2.51398596439905E-01):b := 9.76440010207890E-02+I*(-1.63237186179318E-01):c := 1.90594953451819E-02+I*(1.01846059814797E+00):d := 4.29198793965376E-01+I*(3.12523605062938E-01):e := 1.82078774732508E-01+I*(4.34457656045886E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.31260672281841E-01+I*(-4.74581848849013E-01):b := -5.76447164049280E-03+I*(-5.01172109690707E-01):c := -1.19646044287538E-01+I*(1.28459088589293E+00):d := 3.74221307753939E-01+I*(2.57791177463124E-01):e := 2.62179056993264E-01+I*(3.72751418767837E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.33051428075830E-01+I*(-7.67429515927012E-01):b := 1.32240424219400E-01+I*(-8.26514964945724E-01):c := -3.96965903677774E-01+I*(1.39930031169481E+00):d := 3.67287436254244E-01+I*(1.80524858493450E-01):e := 3.59722269863166E-01+I*(3.33219988083453E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.46184374677452E-01+I*(-9.92914919608820E-01):b := 4.47084664074050E-01+I*(-9.87034214187471E-01):c := -6.83139038549906E-01+I*(1.30891506036765E+00):d := 4.11641615002396E-01+I*(1.16878417519309E-01):e := 4.96334862901493E-01+I*(3.24168575571002E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.58096683167772E-01+I*(-1.04553093352060E+00):b := 7.91449128991505E-01+I*(-9.07621116722996E-01):c := -8.44261858637143E-01+I*(1.05572739552761E+00):d := 4.86530030820346E-01+I*(9.66327316239036E-02):e := 7.05373991504031E-01+I*(4.17265704455098E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56932059485080E-01+I*(-8.72440182470742E-01):b := 1.01009504067043E+00+I*(-7.42269189062746E-01):c := -8.68557332767997E-01+I*(5.61691242062999E-01):d := 2.85384041516444E-01+I*(2.72142278761295E-01):e := 6.28852759846211E-01+I*(4.83875177471865E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.58774620556926E-01+I*(-5.97865865256499E-01):b := 9.91686668382867E-01+I*(-3.89346454492543E-01):c := -6.47194841555172E-01+I*(3.59050663046679E-01):d := 3.18326386886440E-01+I*(3.42377344808260E-01):e := -9.03731016194594E-01+I*(1.37717456751978E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.60297579495562E-01+I*(-3.22066598935613E-01):b := 7.50730676126694E-01+I*(-1.30824628445630E-01):c := -3.47366481835216E-01+I*(3.46108040141765E-01):d := 2.98415457279927E-01+I*(4.17355458303481E-01):e := -3.70341026518563E-01+I*(8.71734168887321E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07579438264001E-01+I*(-1.74091925387044E-01):b := 3.99973050606139E-01+I*(-8.76689464794150E-02):c := -1.09365275342143E-01+I*(5.28919370446697E-01):d := 2.34967797945125E-01+I*(4.61993526653631E-01):e := -9.08944414015631E-02+I*(7.13788407039240E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.81130176206223E-01+I*(-2.23180838919479E-01):b := 1.03537183039055E-01+I*(-2.80072431807870E-01):c := -4.45546316828348E-02+I*(8.21945200790173E-01):d := 1.57671273826977E-01+I*(4.55404901580805E-01):e := 1.09889265980017E-01+I*(6.31156198732557E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.70740826654539E-01+I*(-4.46364091328586E-01):b := 1.28710377772764E-04+I*(-6.18007355319258E-01):c := -1.83260171315554E-01+I*(1.08807548853513E+00):d := 1.02693787615540E-01+I*(4.00672473980991E-01):e := 2.96477650238769E-01+I*(5.74364475661264E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.72531582448528E-01+I*(-7.39211758406586E-01):b := 1.38133606237665E-01+I*(-9.43350210574275E-01):c := -4.60580030705790E-01+I*(1.20278491433701E+00):d := 9.57599161158448E-02+I*(3.23406155011317E-01):e := 5.17543193750096E-01+I*(5.29881920087271E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.85664529050149E-01+I*(-9.64697162088395E-01):b := 4.52977846092316E-01+I*(-1.10386945981602E+00):c := -7.46753165577924E-01+I*(1.11239966300986E+00):d := 1.40114094863997E-01+I*(2.59759714037177E-01):e := 8.67204138442161E-01+I*(5.06835442268283E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.02423162459530E-01+I*(-1.01731317600017E+00):b := 7.97342311009771E-01+I*(-1.02445636235155E+00):c := -9.07875985665160E-01+I*(8.59211998169813E-01):d := 2.15002510681947E-01+I*(2.39514028141771E-01):e := 1.72779098724503E+00+I*(6.98804971203314E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.81920764106630E-01+I*(-6.90598608303337E-01):b := 1.26655683378820E+00+I*(-6.35980394579824E-01):c := -1.24998967013259E+00+I*(4.43169400921800E-01):d := 2.16163244692747E-01+I*(2.05985513226061E-01):e := 4.32389314543291E-01+I*(1.48581421179159E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.83763325178476E-01+I*(-4.16024291089094E-01):b := 1.24814846150064E+00+I*(-2.83057660009622E-01):c := -1.02862717891976E+00+I*(2.40528821905481E-01):d := 2.49105590062743E-01+I*(2.76220579273026E-01):e := -2.01642695302599E-01+I*(1.04229450642693E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.85286284117112E-01+I*(-1.40225024768208E-01):b := 1.00719246924446E+00+I*(-2.45358339627089E-02):c := -7.28798819199810E-01+I*(2.27586199000567E-01):d := 2.29194660456230E-01+I*(3.51198692768246E-01):e := -1.29581363771176E-01+I*(6.95807190172163E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.32568142885552E-01+I*(7.74964878036050E-03):b := 6.56434843723909E-01+I*(1.86198480035070E-02):c := -4.90797612706737E-01+I*(4.10397529305499E-01):d := 1.65747001121429E-01+I*(3.95836761118396E-01):e := -6.63407152238202E-03+I*(5.56753490817899E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.61414715846731E-02+I*(-4.13392647520743E-02):b := 3.59998976156824E-01+I*(-1.73783637324947E-01):c := -4.25986969047429E-01+I*(7.03423359648974E-01):d := 8.84504770032808E-02+I*(3.89248136045571E-01):e := 1.05470104386009E-01+I*(4.88740608273055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.45752122032988E-01+I*(-2.64522517161182E-01):b := 2.56590503495542E-01+I*(-5.11718560836336E-01):c := -5.64692508680149E-01+I*(9.69553647393931E-01):d := 3.34729907918438E-02+I*(3.34515708445757E-01):e := 2.18269429330844E-01+I*(4.52822928647020E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.47542877826978E-01+I*(-5.57370184239181E-01):b := 3.94595399355434E-01+I*(-8.37061416091353E-01):c := -8.42012368070384E-01+I*(1.08426307319581E+00):d := 2.65391192921483E-02+I*(2.57249389476083E-01):e := 3.52052237034268E-01+I*(4.43661637691390E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.06758244285992E-02+I*(-7.82855587920990E-01):b := 7.09439639210085E-01+I*(-9.97580665333101E-01):c := -1.12818550294252E+00+I*(9.93877821868656E-01):d := 7.08932980402997E-02+I*(1.93602948501943E-01):e := 5.41143114101460E-01+I*(4.90917398872060E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.27411867081080E-01+I*(-8.35471601832768E-01):b := 1.05380410412754E+00+I*(-9.18167567868626E-01):c := -1.28930832302975E+00+I*(7.40690157028614E-01):d := 1.45781713858250E-01+I*(1.73357262606537E-01):e := 8.07400879084940E-01+I*(7.66340756726616E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.99370494167146E-01+I*(-4.29136682344757E-01):b := 1.38264042982642E+00+I*(-6.50464970728990E-01):c := -1.06750626046064E+00+I*(3.46397174788832E-01):d := 2.83023770630613E-02+I*(-3.66058169993979E-02):e := -2.53039421286024E-01+I*(8.39548017539525E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.01213055238992E-01+I*(-1.54562365130514E-01):b := 1.36423205753885E+00+I*(-2.97542236158788E-01):c := -8.46143769247817E-01+I*(1.43756595772513E-01):d := 6.12447224330575E-02+I*(3.36292490475673E-02):e := -2.84110007437337E-01+I*(5.76089946355520E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02736014177628E-01+I*(1.21236901190372E-01):b := 1.12327606528268E+00+I*(-3.90204101118743E-02):c := -5.46315409527862E-01+I*(1.30813972867598E-01):d := 4.13337928265444E-02+I*(1.08607362542788E-01):e := -1.89640198809522E-01+I*(4.59185371580693E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.50017872946067E-01+I*(2.69211574738941E-01):b := 7.72518439762123E-01+I*(4.13527185434115E-03):c := -3.08314203034789E-01+I*(3.13625303172530E-01):d := -2.21138665082570E-02+I*(1.53245430892938E-01):e := -9.79343122605624E-02+I*(4.18111616234952E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.86917415241571E-02+I*(2.20122661206506E-01):b := 4.76082572195039E-01+I*(-1.88268213474113E-01):c := -2.43503559375481E-01+I*(6.06651133516006E-01):d := -9.94103906264048E-02+I*(1.46656805820113E-01):e := -1.48892014431798E-02+I*(4.11582543400384E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.28302391972472E-01+I*(-3.06059120260111E-03):b := 3.72674099533757E-01+I*(-5.26203136985501E-01):c := -3.82209099008200E-01+I*(8.72781421260962E-01):d := -1.54387876837842E-01+I*(9.19243782202984E-02):e := 6.74673935607668E-02+I*(4.31248546535941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.30093147766462E-01+I*(-2.95908258280601E-01):b := 5.10678995393649E-01+I*(-8.51545992240519E-01):c := -6.59528958398435E-01+I*(9.87490847062844E-01):d := -1.61321748337538E-01+I*(1.46580592506246E-02):e := 1.55311952439299E-01+I*(4.89991969776130E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.32260943680831E-02+I*(-5.21393661962409E-01):b := 8.25523235248300E-01+I*(-1.01206524148227E+00):c := -9.45702093270569E-01+I*(8.97105595735687E-01):d := -1.16967569589386E-01+I*(-4.89883817235155E-02):e := 2.30245070733075E-01+I*(6.35460049767948E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.44861597141596E-01+I*(-5.74009675874188E-01):b := 1.16988770016575E+00+I*(-9.32652144017791E-01):c := -1.10682491335780E+00+I*(6.43917930895645E-01):d := -4.20791537714355E-02+I*(-6.92340676189217E-02):e := 1.17463523713940E-01+I*(9.02248835221332E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.44673276502976E-01+I*(-2.17628756601726E-01):b := 1.48087612958900E+00+I*(-5.86943702577770E-01):c := -8.65511870599986E-01+I*(3.89563423421899E-01):d := 4.03273046221304E-02+I*(-3.43196195524776E-01):e := -1.24540960624946E-01+I*(5.32452622116439E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46515837574822E-01+I*(5.69455606125171E-02):b := 1.46246775730144E+00+I*(-2.34020968007568E-01):c := -6.44149379387161E-01+I*(1.86922844405580E-01):d := 7.32696499921267E-02+I*(-2.72961129477810E-01):e := -1.56783466929746E-01+I*(4.21264240611821E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.48038796513459E-01+I*(3.32744826933403E-01):b := 1.22151176504527E+00+I*(2.45008580393448E-02):c := -3.44321019667206E-01+I*(1.73980221500665E-01):d := 5.33587203856134E-02+I*(-1.97983015982590E-01):e := -1.18348539096352E-01+I*(3.52550802986318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.53206552818976E-02+I*(4.80719500481972E-01):b := 8.70754139524711E-01+I*(6.76565400055607E-02):c := -1.06319813174133E-01+I*(3.56791551805597E-01):d := -1.00889389491879E-02+I*(-1.53344947632440E-01):e := -6.78083194533923E-02+I*(3.24100213584882E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.93388959188327E-01+I*(4.31630586949537E-01):b := 5.74318271957626E-01+I*(-1.24746945322894E-01):c := -4.15091695148251E-02+I*(6.49817382149073E-01):d := -8.73854630673357E-02+I*(-1.59933572705265E-01):e := -1.79937885652756E-02+I*(3.19992035988687E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.82999609636642E-01+I*(2.08447334540429E-01):b := 4.70909799296344E-01+I*(-4.62681868834282E-01):c := -1.80214709147545E-01+I*(9.15947669894029E-01):d := -1.42362949278773E-01+I*(-2.14666000305079E-01):e := 3.03542645022050E-02+I*(3.35987478143136E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.84790365430631E-01+I*(-8.44003325375701E-02):b := 6.08914695156237E-01+I*(-7.88024724089299E-01):c := -4.57534568537780E-01+I*(1.03065709569591E+00):d := -1.49296820778468E-01+I*(-2.91932319274753E-01):e := 7.44828860216256E-02+I*(3.78536806847243E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.97923312032253E-01+I*(-3.09885736219379E-01):b := 9.23758935010887E-01+I*(-9.48543973331047E-01):c := -7.43707703409913E-01+I*(9.40271844368755E-01):d := -1.04942642030317E-01+I*(-3.55578760248893E-01):e := 9.25994113992573E-02+I*(4.62266100482088E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.01643794774262E-02+I*(-3.62501750131157E-01):b := 1.26812339992834E+00+I*(-8.69130875866572E-01):c := -9.04830523497148E-01+I*(6.87084179528712E-01):d := -3.00542262123664E-02+I*(-3.75824446144299E-01):e := 1.72093724737977E-02+I*(5.61704625600812E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.02136585272516E-02+I*(-1.55041740178166E-01):b := 1.51529835738886E+00+I*(-4.75138897454380E-01):c := -7.38521920484007E-01+I*(5.52470179346174E-01):d := 2.46611430122882E-01+I*(-5.70328576865537E-01):e := -7.28271415667011E-03+I*(4.22801100497036E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.92056219599098E-01+I*(1.19532577036077E-01):b := 1.49688998510129E+00+I*(-1.22216162884178E-01):c := -5.17159429271181E-01+I*(3.49829600329855E-01):d := 2.79553775492879E-01+I*(-5.00093510818572E-01):e := -5.49537451095604E-02+I*(3.66459228766338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.35791785377333E-02+I*(3.95331843356963E-01):b := 1.25593399284512E+00+I*(1.36305663162735E-01):c := -2.17331069551226E-01+I*(3.36886977424941E-01):d := 2.59642845886365E-01+I*(-4.25115397323352E-01):e := -4.77772711295176E-02+I*(3.11863604556573E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.59138962693828E-01+I*(5.43306516905532E-01):b := 9.05176367324565E-01+I*(1.79461345128951E-01):c := 2.06701369418471E-02+I*(5.19698307729872E-01):d := 1.96195186551564E-01+I*(-3.80477328973202E-01):e := -1.92775103289191E-02+I*(2.81175000842641E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.47848577164052E-01+I*(4.94217603373097E-01):b := 6.08740499757481E-01+I*(-1.29421401995036E-02):c := 8.54807806011547E-02+I*(8.12724138073348E-01):d := 1.18898662433417E-01+I*(-3.87065954046027E-01):e := 1.46177096765752E-02+I*(2.69548943393699E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.37459227612367E-01+I*(2.71034350963989E-01):b := 5.05332027096199E-01+I*(-3.50877063710892E-01):c := -5.32247590315649E-02+I*(1.07885442581831E+00):d := 6.39211762219797E-02+I*(-4.41798381645841E-01):e := 4.97431206534847E-02+I*(2.73767071906532E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.39249983406356E-01+I*(-2.18133161140107E-02):b := 6.43336922956091E-01+I*(-6.76219918965909E-01):c := -3.30544618421800E-01+I*(1.19356385162019E+00):d := 5.69873047222842E-02+I*(-5.19064700615515E-01):e := 8.30812068514137E-02+I*(2.96507949402191E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.52382930007978E-01+I*(-2.47298719795819E-01):b := 9.58181162810741E-01+I*(-8.36739168207657E-01):c := -6.16717753293933E-01+I*(1.10317860029303E+00):d := 1.01341483470435E-01+I*(-5.82711141589655E-01):e := 1.02606518158424E-01+I*(3.44907880070101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.64295238498299E-01+I*(-2.99914733707598E-01):b := 1.30254562772820E+00+I*(-7.57326070743182E-01):c := -7.77840573381169E-01+I*(8.49990935452988E-01):d := 1.76229899288386E-01+I*(-6.02956827485061E-01):e := 7.46193722222147E-02+I*(4.09704139810345E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.44943876505543E-01+I*(-2.70660793635868E-01):b := 1.46980057027798E+00+I*(-3.67365266248053E-01):c := -7.45956419108058E-01+I*(7.58891560957769E-01):d := 5.50632118650832E-01+I*(-6.11725195497102E-01):e := 8.90013537950245E-02+I*(3.67530176904793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.31013154336972E-02+I*(3.91352357837479E-03):b := 1.45139219799041E+00+I*(-1.44425316778511E-02):c := -5.24593927895232E-01+I*(5.56250981941450E-01):d := 5.83574464020828E-01+I*(-5.41490129450137E-01):e := 3.15549300849163E-02+I*(3.45003912527151E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41578356495061E-01+I*(2.79712789899261E-01):b := 1.21043620573424E+00+I*(2.44079294369062E-01):c := -2.24765568175277E-01+I*(5.43308359036535E-01):d := 5.63663534414315E-01+I*(-4.66512015954917E-01):e := 1.63809762098141E-02+I*(2.98622004110082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.94296497726622E-01+I*(4.27687463447830E-01):b := 8.59678580213686E-01+I*(2.87234976335278E-01):c := 1.32356383177961E-02+I*(7.26119689341467E-01):d := 5.00215875079514E-01+I*(-4.21873947604767E-01):e := 2.95950830092821E-02+I*(2.63662636986866E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.83006112196847E-01+I*(3.78598549915395E-01):b := 5.63242712646601E-01+I*(9.48314910068239E-02):c := 7.80462819771038E-02+I*(1.01914551968494E+00):d := 4.22919350961366E-01+I*(-4.28462572677592E-01):e := 5.40070829133839E-02+I*(2.44155747008734E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.72616762645162E-01+I*(1.55415297506287E-01):b := 4.59834239985319E-01+I*(-2.43103432504564E-01):c := -6.06592576556156E-02+I*(1.28527580742990E+00):d := 3.67941864749929E-01+I*(-4.83195000277406E-01):e := 8.31345297048423E-02+I*(2.38251622552369E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.74407518439151E-01+I*(-1.37432369571712E-01):b := 5.97839135845211E-01+I*(-5.68446287759582E-01):c := -3.37979117045851E-01+I*(1.39998523323178E+00):d := 3.61007993250233E-01+I*(-5.60461319247080E-01):e := 1.14220655293018E-01+I*(2.47296642933339E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.87540465040773E-01+I*(-3.62917773253521E-01):b := 9.12683375699862E-01+I*(-7.28965537001329E-01):c := -6.24152251917984E-01+I*(1.30959998190462E+00):d := 4.05362171998385E-01+I*(-6.24107760221220E-01):e := 1.40612609174215E-01+I*(2.77191781468761E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.99452773531094E-01+I*(-4.15533787165300E-01):b := 1.25704784061732E+00+I*(-6.49552439536854E-01):c := -7.85275072005220E-01+I*(1.05641231706458E+00):d := 4.80250587816336E-01+I*(-6.44353446116626E-01):e := 1.40346899058618E-01+I*(3.29640519534871E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.50766504468676E-01+I*(-5.10386476899326E-01):b := 1.36567168849713E+00+I*(-3.14051288770721E-01):c := -8.84336681940697E-01+I*(9.12240709682501E-01):d := 8.10134711230162E-01+I*(-4.48016113489592E-01):e := 1.83225660619379E-01+I*(3.33990781223789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.48923943396830E-01+I*(-2.35812159685083E-01):b := 1.34726331620956E+00+I*(3.88714457994813E-02):c := -6.62974190727872E-01+I*(7.09600130666182E-01):d := 8.43077056600158E-01+I*(-3.77781047442627E-01):e := 1.18738607486586E-01+I*(3.42610838998058E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.47400984458194E-01+I*(3.99871066358034E-02):b := 1.10630732395339E+00+I*(2.97393271846395E-01):c := -3.63145831007917E-01+I*(6.96657507761268E-01):d := 8.23166126993645E-01+I*(-3.02802933947406E-01):e := 8.14958765121075E-02+I*(3.03879237883768E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00119125689755E-01+I*(1.87961780184372E-01):b := 7.55549698432833E-01+I*(3.40548953812610E-01):c := -1.25144624514844E-01+I*(8.79468838066199E-01):d := 7.59718467658844E-01+I*(-2.58164865597256E-01):e := 8.02675144762925E-02+I*(2.63131783320663E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.88828740159979E-01+I*(1.38872866651937E-01):b := 4.59113830865748E-01+I*(1.48145468484156E-01):c := -6.03339808555358E-02+I*(1.17249466840968E+00):d := 6.82421943540696E-01+I*(-2.64753490670081E-01):e := 9.71369121506166E-02+I*(2.34850316683462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.78439390608294E-01+I*(-8.43103857571703E-02):b := 3.55705358204466E-01+I*(-1.89789455027233E-01):c := -1.99039520488255E-01+I*(1.43862495615463E+00):d := 6.27444457329259E-01+I*(-3.19485918269896E-01):e := 1.22780372724240E-01+I*(2.19147804071240E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.80230146402284E-01+I*(-3.77158052835170E-01):b := 4.93710254064358E-01+I*(-5.15132310282250E-01):c := -4.76359379878490E-01+I*(1.55333438195651E+00):d := 6.20510585829563E-01+I*(-3.96752237239570E-01):e := 1.54151600729290E-01+I*(2.16714701919858E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.93363093003905E-01+I*(-6.02643456516978E-01):b := 8.08554493919009E-01+I*(-6.75651559523997E-01):c := -7.62532514750623E-01+I*(1.46294913062936E+00):d := 6.64864764577715E-01+I*(-4.60398678213709E-01):e := 1.87871442440642E-01+I*(2.33133012927398E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.05275401494226E-01+I*(-6.55259470428757E-01):b := 1.15291895883646E+00+I*(-5.96238462059523E-01):c := -9.23655334837859E-01+I*(1.20976146578931E+00):d := 7.39753180395665E-01+I*(-4.80644364109116E-01):e := 2.09052295629447E-01+I*(2.77287328461107E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.77738641650690E-01+I*(-7.62048478515367E-01):b := 1.25163477309517E+00+I*(-3.40143167602888E-01):c := -1.08891304607722E+00+I*(9.40763854546121E-01):d := 9.03695060742940E-01+I*(-1.55802629738102E-01):e := 2.96288927741414E-01+I*(3.15763230835890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.58960805788440E-02+I*(-4.87474161301124E-01):b := 1.23322640080761E+00+I*(1.27795669673147E-02):c := -8.67550554864395E-01+I*(7.38123275529802E-01):d := 9.36637406112936E-01+I*(-8.55675636911370E-02):e := 2.24232887762441E-01+I*(3.65239147818134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.74373121640208E-01+I*(-2.11674894980238E-01):b := 9.92270408551436E-01+I*(2.71301393014228E-01):c := -5.67722195144440E-01+I*(7.25180652624887E-01):d := 9.16726476506423E-01+I*(-1.05894501959166E-02):e := 1.55931741741918E-01+I*(3.35179979268170E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.27091262871769E-01+I*(-6.37002214316694E-02):b := 6.41512783030881E-01+I*(3.14457074980444E-01):c := -3.29720988651367E-01+I*(9.07991982929819E-01):d := 8.53278817171622E-01+I*(3.40486181542336E-02):e := 1.36782680968246E-01+I*(2.83779850543391E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.15800877341993E-01+I*(-1.12789134964104E-01):b := 3.45076915463796E-01+I*(1.22053589651989E-01):c := -2.64910344992059E-01+I*(1.20101781327329E+00):d := 7.75982293053474E-01+I*(2.74599930814083E-02):e := 1.46540913320250E-01+I*(2.42842571103722E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.05411527790309E-01+I*(-3.35972387373212E-01):b := 2.41668442802514E-01+I*(-2.15881333859399E-01):c := -4.03615884624779E-01+I*(1.46714810101825E+00):d := 7.21004806842037E-01+I*(-2.72724345184059E-02):e := 1.70467161706018E-01+I*(2.15065189482823E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.07202283584298E-01+I*(-6.28820054451212E-01):b := 3.79673338662407E-01+I*(-5.41224189114416E-01):c := -6.80935744015015E-01+I*(1.58185752682013E+00):d := 7.14070935342342E-01+I*(-1.04538753488080E-01):e := 2.04311713860863E-01+I*(2.00183001353933E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.20335230185920E-01+I*(-8.54305458133020E-01):b := 6.94517578517057E-01+I*(-7.01743438356164E-01):c := -9.67108878887147E-01+I*(1.49147227549298E+00):d := 7.58425114090493E-01+I*(-1.68185194462220E-01):e := 2.47331386109316E-01+I*(2.03249821608736E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.32247538676240E-01+I*(-9.06921472044798E-01):b := 1.03888204343451E+00+I*(-6.22330340891689E-01):c := -1.12823169897438E+00+I*(1.23828461065293E+00):d := 8.33313529908443E-01+I*(-1.88430880357626E-01):e := 2.91494929891062E-01+I*(2.39031775498793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.99691633215880E-02+I*(-9.07891351016245E-01):b := 1.18104896416784E+00+I*(-4.33432222660048E-01):c := -1.26396195712512E+00+I*(8.31114699067495E-01):d := 7.87535239844677E-01+I*(1.28185319118921E-01):e := 4.67825230810824E-01+I*(3.30180756845605E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.41811724393434E-01+I*(-6.33317033802002E-01):b := 1.16264059188027E+00+I*(-8.05094880898461E-02):c := -1.04259946591229E+00+I*(6.28474120051176E-01):d := 8.20477585214673E-01+I*(1.98420385165886E-01):e := 3.73347842270462E-01+I*(4.58699307932203E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.33346833320703E-02+I*(-3.57517767481116E-01):b := 9.21684599624101E-01+I*(1.78012337957067E-01):c := -7.42771106192337E-01+I*(6.15531497146262E-01):d := 8.00566655608160E-01+I*(2.73398498661106E-01):e := 2.39247042856117E-01+I*(4.30137317530645E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.09383457899491E-01+I*(-2.09543093932547E-01):b := 5.70926974103546E-01+I*(2.21168019923283E-01):c := -5.04769899699264E-01+I*(7.98342827451193E-01):d := 7.37118996273359E-01+I*(3.18036567011256E-01):e := 1.95564668629190E-01+I*(3.48451346038005E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.98093072369715E-01+I*(-2.58632007464982E-01):b := 2.74491106536461E-01+I*(2.87645345948282E-02):c := -4.39959256039956E-01+I*(1.09136865779467E+00):d := 6.59822472155211E-01+I*(3.11447941938431E-01):e := 2.01817122382772E-01+I*(2.83289103921890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.87703722818030E-01+I*(-4.81815259874089E-01):b := 1.71082633875179E-01+I*(-3.09170388916560E-01):c := -5.78664795672675E-01+I*(1.35749894553963E+00):d := 6.04844985943774E-01+I*(2.56715514338617E-01):e := 2.29394172095089E-01+I*(2.36842081863585E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.89494478612020E-01+I*(-7.74662926952089E-01):b := 3.09087529735072E-01+I*(-6.34513244171578E-01):c := -8.55984655062911E-01+I*(1.47220837134151E+00):d := 5.97911114444078E-01+I*(1.79449195368943E-01):e := 2.71747896677085E-01+I*(2.05179851859644E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.02627425213641E-01+I*(-1.00014833063390E+00):b := 6.23931769589722E-01+I*(-7.95032493413324E-01):c := -1.14215778993504E+00+I*(1.38182312001435E+00):d := 6.42265293192230E-01+I*(1.15802754394803E-01):e := 3.31694240053897E-01+I*(1.91703454529699E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.14539733703962E-01+I*(-1.05276434454568E+00):b := 9.68296234507176E-01+I*(-7.15619395948850E-01):c := -1.30328061002228E+00+I*(1.12863545517431E+00):d := 7.17153709010180E-01+I*(9.55570684993970E-02):e := 4.11526216586077E-01+I*(2.17918117963763E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.00489008948890E-01+I*(-8.79673593495819E-01):b := 1.18694214618610E+00+I*(-5.50267468288600E-01):c := -1.32757608415313E+00+I*(6.34599301709695E-01):d := 5.16007719706278E-01+I*(2.71066615636788E-01):e := 7.88519562699420E-01+I*(5.29523241838127E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.02331570020736E-01+I*(-6.05099276281575E-01):b := 1.16853377389854E+00+I*(-1.97344733718398E-01):c := -1.10621359294031E+00+I*(4.31958722693376E-01):d := 5.48950065076274E-01+I*(3.41301681683753E-01):e := 4.85823082847088E-01+I*(8.41509013504266E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03854528959373E-01+I*(-3.29300009960689E-01):b := 9.27577781642366E-01+I*(6.11770923285156E-02):c := -8.06385233220354E-01+I*(4.19016099788462E-01):d := 5.29039135469761E-01+I*(4.16279795178974E-01):e := 2.14568803947547E-01+I*(6.68922855115790E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.11363877278117E-02+I*(-1.81325336412121E-01):b := 5.76820156121811E-01+I*(1.04332774294731E-01):c := -5.68384026727280E-01+I*(6.01827430093393E-01):d := 4.65591476134960E-01+I*(4.60917863529124E-01):e := 1.88915361497105E-01+I*(4.95384445123696E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.37573226742413E-01+I*(-2.30414249944555E-01):b := 2.80384288554727E-01+I*(-8.80707110337232E-02):c := -5.03573383067973E-01+I*(8.94853260436869E-01):d := 3.88294952016812E-01+I*(4.54329238456298E-01):e := 2.25956418450491E-01+I*(3.89267327677336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.27183877190728E-01+I*(-4.53597502353663E-01):b := 1.76975815893445E-01+I*(-4.26005634545112E-01):c := -6.42278922700692E-01+I*(1.16098354818183E+00):d := 3.33317465805375E-01+I*(3.99596810856484E-01):e := 2.82250333242703E-01+I*(3.18722045045554E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.28974632984718E-01+I*(-7.46445169431662E-01):b := 3.14980711753337E-01+I*(-7.51348489800129E-01):c := -9.19598782090927E-01+I*(1.27569297398371E+00):d := 3.26383594305679E-01+I*(3.22330491886810E-01):e := 3.56137658515800E-01+I*(2.68361458744149E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.42107579586339E-01+I*(-9.71930573113471E-01):b := 6.29824951607987E-01+I*(-9.11867739041876E-01):c := -1.20577191696306E+00+I*(1.18530772265655E+00):d := 3.70737773053831E-01+I*(2.58684050912670E-01):e := 4.61455145371047E-01+I*(2.39510554046237E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.59801119233401E-02+I*(-1.02454658702525E+00):b := 9.74189416525442E-01+I*(-8.32454641577402E-01):c := -1.36689473705030E+00+I*(9.32120057816509E-01):d := 4.45626188871781E-01+I*(2.38438365017264E-01):e := 6.25242896600646E-01+I*(2.71890921050934E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.43332425873388E-01+I*(-7.32420616161467E-01):b := 1.27861324909804E+00+I*(-3.75223415077105E-01):c := -1.64848283130577E+00+I*(2.03968648868586E-01):d := 3.93522654750359E-01+I*(3.53403550307625E-01):e := 8.30964811308773E-01+I*(2.85280083051457E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.45174986945234E-01+I*(-4.57846298947224E-01):b := 1.26020487681048E+00+I*(-2.23006805069025E-02):c := -1.42712034009295E+00+I*(1.32806985226623E-03):d := 4.26465000120355E-01+I*(4.23638616354591E-01):e := 7.40509959095346E-01+I*(6.95956822770862E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46697945883870E-01+I*(-1.82047032626337E-01):b := 1.01924888455430E+00+I*(2.36221145540011E-01):c := -1.12729198037299E+00+I*(-1.16145530526483E-02):d := 4.06554070513842E-01+I*(4.98616729849811E-01):e := 3.74561466133226E-01+I*(6.68912106671337E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.93979804652309E-01+I*(-3.40723590777689E-02):b := 6.68491259033750E-01+I*(2.79376827506226E-01):c := -8.89290773879917E-01+I*(1.71196777252284E-01):d := 3.43106411179041E-01+I*(5.43254798199961E-01):e := 2.77480644441055E-01+I*(4.90185028755668E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.47298098179155E-02+I*(-8.31612726102035E-02):b := 3.72055391466665E-01+I*(8.69733421777714E-02):c := -8.24480130220609E-01+I*(4.64222607595761E-01):d := 2.65809887060893E-01+I*(5.36666173127136E-01):e := 2.83971118609025E-01+I*(3.67204053557937E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.84340460266231E-01+I*(-3.06344525019311E-01):b := 2.68646918805383E-01+I*(-2.50961581333617E-01):c := -9.63185669853329E-01+I*(7.30352895340717E-01):d := 2.10832400849456E-01+I*(4.81933745527321E-01):e := 3.21606587008918E-01+I*(2.81648800992520E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.86131216060220E-01+I*(-5.99192192097310E-01):b := 4.06651814665275E-01+I*(-5.76304436588634E-01):c := -1.24050552924356E+00+I*(8.45062321142599E-01):d := 2.03898529349760E-01+I*(4.04667426557647E-01):e := 3.79291287865560E-01+I*(2.15418448468089E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.92641626618414E-02+I*(-8.24677595779119E-01):b := 7.21496054519926E-01+I*(-7.36823685830382E-01):c := -1.52667866411570E+00+I*(7.54677069815442E-01):d := 2.48252708097912E-01+I*(3.41020985583508E-01):e := 4.66457287034119E-01+I*(1.63340046613135E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.88823528847838E-01+I*(-8.77293609690898E-01):b := 1.06586051943738E+00+I*(-6.57410588365907E-01):c := -1.68780148420293E+00+I*(5.01489404975400E-01):d := 3.23141123915863E-01+I*(3.20775299688101E-01):e := 6.11688428926299E-01+I*(1.45273331749706E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.60782155933904E-01+I*(-4.70958690202886E-01):b := 1.39469684513626E+00+I*(-3.89707991226270E-01):c := -1.46599942163382E+00+I*(1.07196422735617E-01):d := 2.05661787120674E-01+I*(1.10812220082168E-01):e := 5.51067985722974E-01+I*(8.17594463974748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.62624717005750E-01+I*(-1.96384372988643E-01):b := 1.37628847284869E+00+I*(-3.67852566560683E-02):c := -1.24463693042100E+00+I*(-9.54441562807023E-02):d := 2.38604132490670E-01+I*(1.81047286129133E-01):e := 1.53066452351418E-01+I*(8.45378573018243E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.64147675944386E-01+I*(7.94148933322425E-02):b := 1.13533248059252E+00+I*(2.21736569390844E-01):c := -9.44808570701043E-01+I*(-1.08386779185616E-01):d := 2.18693202884156E-01+I*(2.56025399624353E-01):e := 4.89530644780174E-02+I*(6.17410275421363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.11429534712825E-01+I*(2.27389566880811E-01):b := 7.84574855071964E-01+I*(2.64892251357060E-01):c := -7.06807364207969E-01+I*(7.44245511193151E-02):d := 1.55245543549355E-01+I*(3.00663467974503E-01):e := 8.68988695764849E-02+I*(4.80203932854561E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.72800797573991E-02+I*(1.78300653348377E-01):b := 4.88138987504879E-01+I*(7.24887660286055E-02):c := -6.41996720548661E-01+I*(3.67450381462791E-01):d := 7.79490194312071E-02+I*(2.94074842901678E-01):e := 1.50045564205351E-01+I*(4.03909300620155E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.66890730205714E-01+I*(-4.48825990607308E-02):b := 3.84730514843597E-01+I*(-2.65446157482783E-01):c := -7.80702260181381E-01+I*(6.33580669207748E-01):d := 2.29715332197700E-02+I*(2.39342415301864E-01):e := 2.22708634452509E-01+I*(3.58548095000029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.68681485999704E-01+I*(-3.37730266138730E-01):b := 5.22735410703490E-01+I*(-5.90789012737800E-01):c := -1.05802211957162E+00+I*(7.48290095009631E-01):d := 1.60376617200747E-02+I*(1.62076096332190E-01):e := 3.10854395170412E-01+I*(3.35959998782428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.18144326013255E-02+I*(-5.63215669820539E-01):b := 8.37579650558140E-01+I*(-7.51308261979548E-01):c := -1.34419525444375E+00+I*(6.57904843682474E-01):d := 6.03918404682265E-02+I*(9.84296553580495E-02):e := 4.29457169497796E-01+I*(3.49750488176963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.06273258908354E-01+I*(-6.15831683732318E-01):b := 1.18194411547559E+00+I*(-6.71895164515072E-01):c := -1.50531807453099E+00+I*(4.04717178842431E-01):d := 1.35280256286177E-01+I*(7.81839694626435E-02):e := 5.82730927716419E-01+I*(4.71061804694355E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.06084938269734E-01+I*(-2.59450764459856E-01):b := 1.49293254489884E+00+I*(-3.26186723075051E-01):c := -1.26400503177317E+00+I*(1.50362671368684E-01):d := 2.17686714679743E-01+I*(-1.95778158443211E-01):e := 1.86553280295631E-01+I*(5.95217073779038E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.07927499341580E-01+I*(1.51235527543875E-02):b := 1.47452417261128E+00+I*(2.67360114951511E-02):c := -1.04264254056034E+00+I*(-5.22779076476354E-02):d := 2.50629060049739E-01+I*(-1.25543092396245E-01):e := 3.55155129459622E-02+I*(5.42900336421284E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09450458280216E-01+I*(2.90922819075274E-01):b := 1.23356818035511E+00+I*(2.85257837542065E-01):c := -7.42814180840387E-01+I*(-6.52205305525499E-02):d := 2.30718130443226E-01+I*(-5.05649789010246E-02):e := 7.61207887696574E-03+I*(4.34969764768811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.67323170486555E-02+I*(4.38897492623842E-01):b := 8.82810554834551E-01+I*(3.28413519508279E-01):c := -5.04812974347313E-01+I*(1.17590799752382E-01):d := 1.67270471108424E-01+I*(-5.92691055087459E-03):e := 3.75253880936638E-02+I*(3.65812785464215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.31977297421569E-01+I*(3.89808579091408E-01):b := 5.86374687267467E-01+I*(1.36010034179825E-01):c := -4.40002330688005E-01+I*(4.10616630095858E-01):d := 8.99739469902761E-02+I*(-1.25155356236999E-02):e := 8.26224674541944E-02+I*(3.28330193459096E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.21587947869884E-01+I*(1.66625326682300E-01):b := 4.82966214606185E-01+I*(-2.01924889331563E-01):c := -5.78707870320725E-01+I*(6.76746917840816E-01):d := 3.49964607788390E-02+I*(-6.72479632235145E-02):e := 1.34431086395232E-01+I*(3.12329868889798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23378703663874E-01+I*(-1.26222340395700E-01):b := 6.20971110466077E-01+I*(-5.27267744586581E-01):c := -8.56027729710960E-01+I*(7.91456343642697E-01):d := 2.80625892791436E-02+I*(-1.44514282193188E-01):e := 1.93810469844336E-01+I*(3.18167604912683E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.36511650265495E-01+I*(-3.51707744077508E-01):b := 9.35815350320728E-01+I*(-6.87786993828328E-01):c := -1.14220086458309E+00+I*(7.01071092315541E-01):d := 7.24167680272955E-02+I*(-2.08160723167328E-01):e := 2.59006470917663E-01+I*(3.60889098968038E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.15760412441838E-02+I*(-4.04323757989287E-01):b := 1.28017981523818E+00+I*(-6.08373896363853E-01):c := -1.30332368467033E+00+I*(4.47883427475497E-01):d := 1.47305183845246E-01+I*(-2.28406409062734E-01):e := 2.93593951035538E-01+I*(4.71909745072830E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.16253202940091E-02+I*(-1.96863748036296E-01):b := 1.52735477269870E+00+I*(-2.14381917951661E-01):c := -1.13701508165719E+00+I*(3.13269427292960E-01):d := 4.23970840180494E-01+I*(-4.22910539783972E-01):e := 1.64511769243066E-01+I*(4.06562674855790E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.53467881365855E-01+I*(7.77105691779473E-02):b := 1.50894640041113E+00+I*(1.38540816618541E-01):c := -9.15652590444362E-01+I*(1.10628848276640E-01):d := 4.56913185550491E-01+I*(-3.52675473737007E-01):e := 8.13780369619379E-02+I*(3.96895704165747E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.49908403044913E-02+I*(3.53509835498833E-01):b := 1.26799040815496E+00+I*(3.97062642665454E-01):c := -6.15824230724407E-01+I*(9.76862253717254E-02):d := 4.37002255943978E-01+I*(-2.77697360241786E-01):e := 4.90585747865706E-02+I*(3.39887987651191E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.97727300927070E-01+I*(5.01484509047402E-01):b := 9.17232782634405E-01+I*(4.40218324631670E-01):c := -3.77823024231333E-01+I*(2.80497555676657E-01):d := 3.73554596609176E-01+I*(-2.33059291891637E-01):e := 5.80993242975211E-02+I*(2.92506707970082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.86436915397294E-01+I*(4.52395595514967E-01):b := 6.20796915067320E-01+I*(2.47814839303215E-01):c := -3.13012380572025E-01+I*(5.73523386020133E-01):d := 2.96258072491028E-01+I*(-2.39647916964462E-01):e := 8.37583524147082E-02+I*(2.63375879294347E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.76047565845610E-01+I*(2.29212343105860E-01):b := 5.17388442406039E-01+I*(-9.01200842081733E-02):c := -4.51717920204745E-01+I*(8.39653673765091E-01):d := 2.41280586279591E-01+I*(-2.94380344564276E-01):e := 1.16914925460346E-01+I*(2.49651588591663E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.77838321639599E-01+I*(-6.36353239721396E-02):b := 6.55393338265931E-01+I*(-4.15462939463191E-01):c := -7.29037779594980E-01+I*(9.54363099566973E-01):d := 2.34346714779896E-01+I*(-3.71646663533950E-01):e := 1.55276341581659E-01+I*(2.52008837963789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.90971268241220E-01+I*(-2.89120727653949E-01):b := 9.70237578120582E-01+I*(-5.75982188704938E-01):c := -1.01521091446711E+00+I*(8.63977848239816E-01):d := 2.78700893528048E-01+I*(-4.35293104508090E-01):e := 1.94698158486435E-01+I*(2.78227421845285E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.02883576731541E-01+I*(-3.41736741565727E-01):b := 1.31460204303804E+00+I*(-4.96569091240463E-01):c := -1.17633373455435E+00+I*(6.10790183399773E-01):d := 3.53589309345998E-01+I*(-4.55538790403496E-01):e := 2.13309062394519E-01+I*(3.39613304184819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.83532214738786E-01+I*(-3.12482801493998E-01):b := 1.48185698558782E+00+I*(-1.06608286745334E-01):c := -1.14444958028124E+00+I*(5.19690808904554E-01):d := 7.27991528708444E-01+I*(-4.64307158415537E-01):e := 1.97591297375651E-01+I*(3.01815555599695E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.16896536669392E-02+I*(-3.79084842797546E-02):b := 1.46344861330025E+00+I*(2.46314447824869E-01):c := -9.23087089068413E-01+I*(3.17050229888234E-01):d := 7.60933874078440E-01+I*(-3.94072092368572E-01):e := 1.40877137397010E-01+I*(3.18931583819207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.80166694728303E-01+I*(2.37890782041131E-01):b := 1.22249262104408E+00+I*(5.04836273871781E-01):c := -6.23258729348457E-01+I*(3.04107606983320E-01):d := 7.41022944471927E-01+I*(-3.19093978873352E-01):e := 1.00862694448030E-01+I*(2.88608682964412E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.32884835959864E-01+I*(3.85865455589700E-01):b := 8.71734995523526E-01+I*(5.47991955837997E-01):c := -3.85257522855384E-01+I*(4.86918937288251E-01):d := 6.77575285137125E-01+I*(-2.74455910523201E-01):e := 9.43961227959859E-02+I*(2.50594713849043E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.21594450430089E-01+I*(3.36776542057265E-01):b := 5.75299127956441E-01+I*(3.55588470509543E-01):c := -3.20446879196076E-01+I*(7.79944767631728E-01):d := 6.00278761018977E-01+I*(-2.81044535596027E-01):e := 1.06993013145967E-01+I*(2.22159637263019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.11205100878404E-01+I*(1.13593289648157E-01):b := 4.71890655295160E-01+I*(1.76535469981541E-02):c := -4.59152418828796E-01+I*(1.04607505537668E+00):d := 5.45301274807541E-01+I*(-3.35776963195841E-01):e := 1.29257653455803E-01+I*(2.04948764280663E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.12995856672393E-01+I*(-1.79254377429842E-01):b := 6.09895551155052E-01+I*(-3.07689308256863E-01):c := -7.36472278219030E-01+I*(1.16078448117857E+00):d := 5.38367403307845E-01+I*(-4.13043282165515E-01):e := 1.57844035978719E-01+I*(1.99751292384157E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.26128803274015E-01+I*(-4.04739781111650E-01):b := 9.24739791009703E-01+I*(-4.68208557498611E-01):c := -1.02264541309116E+00+I*(1.07039922985141E+00):d := 5.82721582055997E-01+I*(-4.76689723139655E-01):e := 1.89860222333733E-01+I*(2.11409389049252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.38041111764336E-01+I*(-4.57355795023429E-01):b := 1.26910425592716E+00+I*(-3.88795460034136E-01):c := -1.18376823317840E+00+I*(8.17211565011368E-01):d := 6.57609997873947E-01+I*(-4.96935409035061E-01):e := 2.13291573860601E-01+I*(2.48441735655278E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.89354842701918E-01+I*(-5.52208484757455E-01):b := 1.37772810380697E+00+I*(-5.32943092680013E-02):c := -1.28282984311388E+00+I*(6.73039957629286E-01):d := 9.87494121287774E-01+I*(-3.00598076408026E-01):e := 2.43515112544803E-01+I*(2.31333832366458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.87512281630071E-01+I*(-2.77634167543212E-01):b := 1.35931973151940E+00+I*(2.99628425302200E-01):c := -1.06146735190105E+00+I*(4.70399378612967E-01):d := 1.02043646665777E+00+I*(-2.30363010361061E-01):e := 2.04855158440583E-01+I*(2.68146687924878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.85989322691435E-01+I*(-1.83490122232615E-03):b := 1.11836373926323E+00+I*(5.58150251349113E-01):c := -7.61638992181097E-01+I*(4.57456755708053E-01):d := 1.00052553705126E+00+I*(-1.55384896865841E-01):e := 1.57687054311340E-01+I*(2.58555865633694E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.38707463922996E-01+I*(1.46139772326242E-01):b := 7.67606113742672E-01+I*(6.01305933315329E-01):c := -5.23637785688023E-01+I*(6.40268086012984E-01):d := 9.37077877716455E-01+I*(-1.10746828515690E-01):e := 1.37448705163066E-01+I*(2.26622435893109E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.27417078393221E-01+I*(9.70508587938079E-02):b := 4.71170246175588E-01+I*(4.08902447986874E-01):c := -4.58827142028715E-01+I*(9.33293916356461E-01):d := 8.59781353598307E-01+I*(-1.17335453588516E-01):e := 1.39378735802260E-01+I*(1.96599501423694E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01702772884154E+00+I*(-1.26132393615300E-01):b := 3.67761773514306E-01+I*(7.09675244754858E-02):c := -5.97532681661435E-01+I*(1.19942420410142E+00):d := 8.04803867386870E-01+I*(-1.72067881188330E-01):e := 1.53962880723989E-01+I*(1.74568949698421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01881848463553E+00+I*(-4.18980060693299E-01):b := 5.05766669374199E-01+I*(-2.54375330779531E-01):c := -8.74852541051671E-01+I*(1.31413362990330E+00):d := 7.97869995887175E-01+I*(-2.49334200158004E-01):e := 1.77031972761837E-01+I*(1.61932991006624E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.31951431237147E-01+I*(-6.44465464375107E-01):b := 8.20610909228849E-01+I*(-4.14894580021279E-01):c := -1.16102567592380E+00+I*(1.22374837857614E+00):d := 8.42224174635326E-01+I*(-3.12980641132144E-01):e := 2.06734572041268E-01+I*(1.62371612825770E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.43863739727468E-01+I*(-6.97081478286886E-01):b := 1.16497537414630E+00+I*(-3.35481482556804E-01):c := -1.32214849601104E+00+I*(9.70560713736100E-01):d := 9.17112590453277E-01+I*(-3.33226327027551E-01):e := 2.36664339813257E-01+I*(1.84370478592063E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.16326979883932E-01+I*(-8.03870486373497E-01):b := 1.26369118840501E+00+I*(-7.93861881001674E-02):c := -1.48740620725040E+00+I*(7.01563102492906E-01):d := 1.08105447080055E+00+I*(-8.38459265653677E-03):e := 3.02500534528025E-01+I*(1.75086081710196E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.14484418812086E-01+I*(-5.29296169159253E-01):b := 1.24528281611745E+00+I*(2.73536546470034E-01):c := -1.26604371603758E+00+I*(4.98922523476587E-01):d := 1.11399681617055E+00+I*(6.18504733904282E-02):e := 2.82243372728582E-01+I*(2.31682674167142E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.12961459873450E-01+I*(-2.53496902838367E-01):b := 1.00432682386128E+00+I*(5.32058372516947E-01):c := -9.66215356317620E-01+I*(4.85979900571672E-01):d := 1.09408588656404E+00+I*(1.36828586885649E-01):e := 2.26406444283420E-01+I*(2.44720103089252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.65679601105011E-01+I*(-1.05522229289799E-01):b := 6.53569198340721E-01+I*(5.75214054483163E-01):c := -7.28214149824546E-01+I*(6.68791230876604E-01):d := 1.03063822722923E+00+I*(1.81466655235799E-01):e := 1.89883169572560E-01+I*(2.17799334409490E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.54389215575236E-01+I*(-1.54611142822233E-01):b := 3.57133330773637E-01+I*(3.82810569154708E-01):c := -6.63403506165238E-01+I*(9.61817061220080E-01):d := 9.53341703111086E-01+I*(1.74878030162973E-01):e := 1.80620034238023E-01+I*(1.83957921022204E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.43999866023551E-01+I*(-3.77794395231341E-01):b := 2.53724858112355E-01+I*(4.48756456433196E-02):c := -8.02109045797958E-01+I*(1.22794734896504E+00):d := 8.98364216899649E-01+I*(1.20145602563159E-01):e := 1.88434030754105E-01+I*(1.55351573758268E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.45790621817540E-01+I*(-6.70642062309340E-01):b := 3.91729753972247E-01+I*(-2.80467209611698E-01):c := -1.07942890518819E+00+I*(1.34265677476692E+00):d := 8.91430345399953E-01+I*(4.28792835934847E-02):e := 2.07720372721446E-01+I*(1.34423149349150E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.58923568419162E-01+I*(-8.96127465991148E-01):b := 7.06573993826897E-01+I*(-4.40986458853445E-01):c := -1.36560204006033E+00+I*(1.25227152343976E+00):d := 9.35784524148105E-01+I*(-2.07671573806555E-02):e := 2.37181083849129E-01+I*(1.24157606846581E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70835876909483E-01+I*(-9.48743479902928E-01):b := 1.05093845874435E+00+I*(-3.61573361388970E-01):c := -1.52672486014756E+00+I*(9.99083858599721E-01):d := 1.01067293996606E+00+I*(-4.10128432760613E-02):e := 2.74558820856273E-01+I*(1.33326094775957E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.38082508834581E-03+I*(-9.49713358874375E-01):b := 1.19310537947768E+00+I*(-1.72675243157330E-01):c := -1.66245511829830E+00+I*(5.91913947014281E-01):d := 9.64894649902289E-01+I*(2.75603356200485E-01):e := 3.89268218393452E-01+I*(1.26715836181161E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03223386160192E-01+I*(-6.75139041660132E-01):b := 1.17469700719011E+00+I*(1.80247491412872E-01):c := -1.44109262708547E+00+I*(3.89273367997961E-01):d := 9.97836995272285E-01+I*(3.45838422247451E-01):e := 3.94308152195882E-01+I*(2.12978820560629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.74634509882845E-03+I*(-3.99339775339246E-01):b := 9.33741014933941E-01+I*(4.38769317459786E-01):c := -1.14126426736552E+00+I*(3.76330745093047E-01):d := 9.77926065665772E-01+I*(4.20816535742671E-01):e := 3.20752096463881E-01+I*(2.59634382889289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.47971796132733E-01+I*(-2.51365101790677E-01):b := 5.82983389413386E-01+I*(4.81924999426001E-01):c := -9.03263060872444E-01+I*(5.59142075397979E-01):d := 9.14478406330970E-01+I*(4.65454604092821E-01):e := 2.57737479724472E-01+I*(2.34730976622333E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.36681410602957E-01+I*(-3.00454015323112E-01):b := 2.86547521846301E-01+I*(2.89521514097547E-01):c := -8.38452417213136E-01+I*(8.52167905741454E-01):d := 8.37181882212822E-01+I*(4.58865979019996E-01):e := 2.34260409657053E-01+I*(1.91005730645965E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.26292061051272E-01+I*(-5.23637267732219E-01):b := 1.83139049185020E-01+I*(-4.84134094138418E-02):c := -9.77157956845856E-01+I*(1.11829819348641E+00):d := 7.82204396001385E-01+I*(4.04133551420182E-01):e := 2.35730344376245E-01+I*(1.51165739956386E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.28082816845262E-01+I*(-8.16484934810218E-01):b := 3.21143945044912E-01+I*(-3.73756264668859E-01):c := -1.25447781623609E+00+I*(1.23300761928829E+00):d := 7.75270524501690E-01+I*(3.26867232450508E-01):e := 2.53057499717630E-01+I*(1.18628917404902E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.41215763446883E-01+I*(-1.04197033849203E+00):b := 6.35988184899563E-01+I*(-5.34275513910607E-01):c := -1.54065095110822E+00+I*(1.14262236796114E+00):d := 8.19624703249842E-01+I*(2.63220791476368E-01):e := 2.85001872324606E-01+I*(9.52960713698828E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.53128071937204E-01+I*(-1.09458635240381E+00):b := 9.80352649817017E-01+I*(-4.54862416446131E-01):c := -1.70177377119546E+00+I*(8.89434703121094E-01):d := 8.94513119067792E-01+I*(2.42975105580962E-01):e := 3.33632283223656E-01+I*(9.00501642925384E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.61900670715649E-01+I*(-9.21495601353948E-01):b := 1.19899856149594E+00+I*(-2.89510488785881E-01):c := -1.72606924532631E+00+I*(3.95398549656481E-01):d := 6.93367129763889E-01+I*(4.18484652718354E-01):e := 5.45312951270425E-01+I*(1.03533768614780E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.63743231787495E-01+I*(-6.46921284139705E-01):b := 1.18059018920838E+00+I*(6.34122457843212E-02):c := -1.50470675411349E+00+I*(1.92757970640161E-01):d := 7.26309475133886E-01+I*(4.88719718765319E-01):e := 5.87800617181733E-01+I*(2.66862517768226E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.65266190726131E-01+I*(-3.71122017818819E-01):b := 9.39634196952207E-01+I*(3.21934071831234E-01):c := -1.20487839439353E+00+I*(1.79815347735247E-01):d := 7.06398545527372E-01+I*(5.63697832260539E-01):e := 4.44919528765374E-01+I*(3.69298561522408E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.25480494945700E-02+I*(-2.23147344270250E-01):b := 5.88876571431652E-01+I*(3.65089753797450E-01):c := -9.66877187900461E-01+I*(3.62626678040179E-01):d := 6.42950886192571E-01+I*(6.08335900610689E-01):e := 3.30586260026234E-01+I*(3.18654418237881E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.76161564975655E-01+I*(-2.72236257802685E-01):b := 2.92440703864567E-01+I*(1.72686268468995E-01):c := -9.02066544241153E-01+I*(6.55652508383655E-01):d := 5.65654362074424E-01+I*(6.01747275537864E-01):e := 2.94210706006982E-01+I*(2.44369764772157E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.65772215423969E-01+I*(-4.95419510211793E-01):b := 1.89032231203285E-01+I*(-1.65248655042393E-01):c := -1.04077208387387E+00+I*(9.21782796128612E-01):d := 5.10676875862986E-01+I*(5.47014847938050E-01):e := 2.95886465856204E-01+I*(1.81831393964740E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.67562971217959E-01+I*(-7.88267177289792E-01):b := 3.27037127063178E-01+I*(-4.90591510297410E-01):c := -1.31809194326411E+00+I*(1.03649222193049E+00):d := 5.03743004363291E-01+I*(4.69748528968376E-01):e := 3.18860643784152E-01+I*(1.30378453149029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.80695917819580E-01+I*(-1.01375258097160E+00):b := 6.41881366917828E-01+I*(-6.51110759539158E-01):c := -1.60426507813624E+00+I*(9.46106970603337E-01):d := 5.48097183111442E-01+I*(4.06102087994236E-01):e := 3.62566934786998E-01+I*(8.84680423329771E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.39177369009884E-03+I*(-1.06636859488338E+00):b := 9.86245831835283E-01+I*(-5.71697662074683E-01):c := -1.76538789822348E+00+I*(6.92919305763294E-01):d := 6.22985598929393E-01+I*(3.85856402098830E-01):e := 4.36532463838272E-01+I*(6.50609732292889E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.40654712264036E-01+I*(-7.89262238575987E-01):b := 1.12023764348645E+00+I*(-1.67722265546157E-01):c := -1.79999102339589E+00+I*(-2.35416224578601E-01):d := 4.34629357579512E-01+I*(5.80336749675813E-01):e := 5.87965535800100E-01+I*(-1.46302569496100E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.42497273335882E-01+I*(-5.14687921361744E-01):b := 1.10182927119888E+00+I*(1.85200469024045E-01):c := -1.57862853218307E+00+I*(-4.38056803594920E-01):d := 4.67571702949509E-01+I*(6.50571815722778E-01):e := 8.00462859519378E-01+I*(-6.07066447340463E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.44020232274518E-01+I*(-2.38888655040857E-01):b := 8.60873278942708E-01+I*(4.43722295070958E-01):c := -1.27880017246311E+00+I*(-4.50999426499835E-01):d := 4.47660773342995E-01+I*(7.25549929217999E-01):e := 7.81162818811540E-01+I*(2.48652144431987E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.91302091042957E-01+I*(-9.09139814922887E-02):b := 5.10115653422153E-01+I*(4.86877977037173E-01):c := -1.04079896597004E+00+I*(-2.68188096194903E-01):d := 3.84213114008194E-01+I*(7.70187997568149E-01):e := 5.46198443909319E-01+I*(3.03161936098200E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.74075234272672E-02+I*(-1.40002895024723E-01):b := 2.13679785855068E-01+I*(2.94474491708719E-01):c := -9.75988322310731E-01+I*(2.48377341485738E-02):d := 3.06916589890046E-01+I*(7.63599372495324E-01):e := 4.31343136578013E-01+I*(2.19076478264149E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.87018173875582E-01+I*(-3.63186147433831E-01):b := 1.10271313193787E-01+I*(-4.34604318026694E-02):c := -1.11469386194345E+00+I*(2.90968021893531E-01):d := 2.51939103678609E-01+I*(7.08866944895509E-01):e := 3.92719322168814E-01+I*(1.32863669301448E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.88808929669572E-01+I*(-6.56033814511830E-01):b := 2.48276209053679E-01+I*(-3.68803287057687E-01):c := -1.39201372133369E+00+I*(4.05677447695412E-01):d := 2.45005232178913E-01+I*(6.31600625925835E-01):e := 3.88926938787488E-01+I*(5.62223489657214E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01941876271194E-01+I*(-8.81519218193639E-01):b := 5.63120448908329E-01+I*(-5.29322536299434E-01):c := -1.67818685620582E+00+I*(3.15292196368256E-01):d := 2.89359410927065E-01+I*(5.67954184951695E-01):e := 4.10038742795590E-01+I*(-1.67414750562826E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.86145815238485E-01+I*(-9.34135232105418E-01):b := 9.07484913825784E-01+I*(-4.49909438834959E-01):c := -1.83930967629306E+00+I*(6.21045315282140E-02):d := 3.64247826745016E-01+I*(5.47708499056289E-01):e := 4.65109143424936E-01+I*(-8.98938183402076E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.58104442324552E-01+I*(-5.27800312617406E-01):b := 1.23632123952466E+00+I*(-1.82206841695323E-01):c := -1.61750761372395E+00+I*(-3.32188450711570E-01):d := 2.46768489949827E-01+I*(3.37745419450355E-01):e := 9.11735068062208E-01+I*(6.08800972097482E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.59947003396398E-01+I*(-2.53225995403163E-01):b := 1.21791286723709E+00+I*(1.70715892874879E-01):c := -1.39614512251112E+00+I*(-5.34829029727890E-01):d := 2.79710835319823E-01+I*(4.07980485497321E-01):e := 1.07904233930725E+00+I*(5.55738475502986E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.61469962335035E-01+I*(2.25732709177227E-02):b := 9.76956874980922E-01+I*(4.29237718921792E-01):c := -1.09631676279117E+00+I*(-5.47771652632803E-01):d := 2.59799905713309E-01+I*(4.82958598992541E-01):e := 5.75557155877905E-01+I*(7.41989858962493E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.08751821103474E-01+I*(1.70547944466291E-01):b := 6.26199249460367E-01+I*(4.72393400888007E-01):c := -8.58315556298091E-01+I*(-3.64960322327871E-01):d := 1.96352246378508E-01+I*(5.27596667342691E-01):e := 3.78662534283932E-01+I*(5.31122039577066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.99577933667512E-02+I*(1.21459030933857E-01):b := 3.29763381893283E-01+I*(2.79989915559553E-01):c := -7.93504912638784E-01+I*(-7.19344919843949E-02):d := 1.19055722260360E-01+I*(5.21008042269866E-01):e := 3.54729821158999E-01+I*(3.74469154445778E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69568443815067E-01+I*(-1.01724221475250E-01):b := 2.26354909232001E-01+I*(-5.79450079518352E-02):c := -9.32210452271503E-01+I*(1.94195795760562E-01):d := 6.40782360489231E-02+I*(4.66275614670051E-01):e := 3.77708546848478E-01+I*(2.64785034011744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.71359199609056E-01+I*(-3.94571888553250E-01):b := 3.64359805091894E-01+I*(-3.83287863206852E-01):c := -1.20953031166174E+00+I*(3.08905221562444E-01):d := 5.71443645492278E-02+I*(3.89009295700377E-01):e := 4.24380695354837E-01+I*(1.76505280406655E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.44921462106776E-02+I*(-6.20057292235059E-01):b := 6.79204044946544E-01+I*(-5.43807112448600E-01):c := -1.49570344653387E+00+I*(2.18519970235287E-01):d := 1.01498543297380E-01+I*(3.25362854726237E-01):e := 5.00761272818679E-01+I*(9.67759252548548E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.03595545299002E-01+I*(-6.72673306146837E-01):b := 1.02356850986400E+00+I*(-4.64394014984125E-01):c := -1.65682626662111E+00+I*(-3.46676946047557E-02):d := 1.76386959115330E-01+I*(3.05117168830831E-01):e := 6.38508859229826E-01+I*(2.89475119873752E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03407224660382E-01+I*(-3.16292386874376E-01):b := 1.33455693928725E+00+I*(-1.18685573544104E-01):c := -1.41551322386329E+00+I*(-2.89022202078503E-01):d := 2.58793417508896E-01+I*(3.11550409249772E-02):e := 6.32087042493972E-01+I*(4.79263483471551E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.05249785732229E-01+I*(-4.17180696601322E-02):b := 1.31614856699968E+00+I*(2.34237161026099E-01):c := -1.19415073265046E+00+I*(-4.91662781094823E-01):d := 2.91735762878892E-01+I*(1.01390106971943E-01):e := 4.15512647169971E-01+I*(6.86653141414366E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.06772744670865E-01+I*(2.34081196660754E-01):b := 1.07519257474351E+00+I*(4.92758987073011E-01):c := -8.94322372930509E-01+I*(-5.04605403999736E-01):d := 2.71824833272378E-01+I*(1.76368220467163E-01):e := 2.12434806673246E-01+I*(5.75033153241175E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.40546034393035E-02+I*(3.82055870209322E-01):b := 7.24434949222954E-01+I*(5.35914669039227E-01):c := -6.56321166437435E-01+I*(-3.21794073694805E-01):d := 2.08377173937577E-01+I*(2.21006288817313E-01):e := 1.82556547473680E-01+I*(4.40608632697168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.34655011030921E-01+I*(3.32966956676888E-01):b := 4.27999081655870E-01+I*(3.43511183710772E-01):c := -5.91510522778127E-01+I*(-2.87682433513281E-02):d := 1.31080649819429E-01+I*(2.14417663744488E-01):e := 2.09519886606571E-01+I*(3.52523441008430E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.24265661479236E-01+I*(1.09783704267780E-01):b := 3.24590608994588E-01+I*(5.57626019938404E-03):c := -7.30216062410847E-01+I*(2.37362044393629E-01):d := 7.61031636079921E-02+I*(1.59685236144673E-01):e := 2.56273619674035E-01+I*(2.93541059859244E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26056417273225E-01+I*(-1.83063962810219E-01):b := 4.62595504854481E-01+I*(-3.19766595055633E-01):c := -1.00753592180108E+00+I*(3.52071470195511E-01):d := 6.91692921082968E-02+I*(8.24189171749993E-02):e := 3.19422090773807E-01+I*(2.53391684751339E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.39189363874847E-01+I*(-4.08549366492028E-01):b := 7.77439744709131E-01+I*(-4.80285844297381E-01):c := -1.29370905667322E+00+I*(2.61686218868354E-01):d := 1.13523470856448E-01+I*(1.87724762008595E-02):e := 4.08162645574089E-01+I*(2.35611276842059E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.88983276348322E-02+I*(-4.61165380403807E-01):b := 1.12180420962659E+00+I*(-4.00872746832905E-01):c := -1.45483187676045E+00+I*(8.49855402831094E-03):d := 1.88411886674399E-01+I*(-1.47320969454649E-03):e := 5.35735638993497E-01+I*(2.75798878306201E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.89476066846567E-02+I*(-2.53705370450816E-01):b := 1.36897916708710E+00+I*(-6.88076842071342E-03):c := -1.28852327374731E+00+I*(-1.26115446154227E-01):d := 4.65077543009648E-01+I*(-1.95977340415785E-01):e := 3.71497189815111E-01+I*(3.62116699827401E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.50790167756503E-01+I*(2.08689467634275E-02):b := 1.35057079479954E+00+I*(3.46041966149489E-01):c := -1.06716078253448E+00+I*(-3.28756025170547E-01):d := 4.98019888379644E-01+I*(-1.25742274368819E-01):e := 2.71216785816965E-01+I*(4.38317568207647E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.23131266951394E-02+I*(2.96668213084313E-01):b := 1.10961480254336E+00+I*(6.04563792196401E-01):c := -7.67332422814529E-01+I*(-3.41698648075461E-01):d := 4.78108958773131E-01+I*(-5.07641608735993E-02):e := 1.75751835412491E-01+I*(3.94801203491690E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.00405014536422E-01+I*(4.44642886632882E-01):b := 7.58857177022809E-01+I*(6.47719474162617E-01):c := -5.29331216321455E-01+I*(-1.58887317770529E-01):d := 4.14661299438329E-01+I*(-6.12609252344920E-03):e := 1.52178664167329E-01+I*(3.25556466188974E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.89114629006646E-01+I*(3.95553973100448E-01):b := 4.62421309455724E-01+I*(4.55315988834163E-01):c := -4.64520572662147E-01+I*(1.34138512572947E-01):d := 3.37364775320181E-01+I*(-1.27147175962746E-02):e := 1.65268398688519E-01+I*(2.73130645029898E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.78725279454962E-01+I*(1.72370720691340E-01):b := 3.59012836794442E-01+I*(1.17381065322774E-01):c := -6.03226112294867E-01+I*(4.00268800317904E-01):d := 2.82387289108744E-01+I*(-6.74471451960890E-02):e := 1.94794130586818E-01+I*(2.37599614841283E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.80516035248951E-01+I*(-1.20476946386659E-01):b := 4.97017732654335E-01+I*(-2.07961789932243E-01):c := -8.80545971685103E-01+I*(5.14978226119786E-01):d := 2.75453417609049E-01+I*(-1.44713464165763E-01):e := 2.36310803169890E-01+I*(2.16850123640685E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.93648981850573E-01+I*(-3.45962350068468E-01):b := 8.11861972508986E-01+I*(-3.68481039173990E-01):c := -1.16671910655724E+00+I*(4.24592974792630E-01):d := 3.19807596357201E-01+I*(-2.08359905139903E-01):e := 2.91089864869129E-01+I*(2.16279701764166E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.05561290340894E-01+I*(-3.98578363980246E-01):b := 1.15622643742644E+00+I*(-2.89067941709516E-01):c := -1.32784192664447E+00+I*(1.71405309952587E-01):d := 3.94696012175151E-01+I*(-2.28605591035309E-01):e := 3.53836786822807E-01+I*(2.56762282226420E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86209928348138E-01+I*(-3.69324423908517E-01):b := 1.32348137997622E+00+I*(1.00892862785613E-01):c := -1.29595777237136E+00+I*(8.03059354573676E-02):d := 7.69098231537597E-01+I*(-2.37373959047350E-01):e := 3.10474680060587E-01+I*(2.35675798511705E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.43673672762914E-02+I*(-9.47501066942745E-02):b := 1.30507300768866E+00+I*(4.53815597355816E-01):c := -1.07459528115853E+00+I*(-1.22334643558953E-01):d := 8.02040576907593E-01+I*(-1.67138893000384E-01):e := 2.68212438729749E-01+I*(2.95529272517142E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.82844408337655E-01+I*(1.81049159626611E-01):b := 1.06411701543248E+00+I*(7.12337423402729E-01):c := -7.74766921438580E-01+I*(-1.35277266463866E-01):d := 7.82129647301080E-01+I*(-9.21607795051640E-02):e := 2.01677497162475E-01+I*(2.91625405646151E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.35562549569216E-01+I*(3.29023833175180E-01):b := 7.13359389911930E-01+I*(7.55493105368944E-01):c := -5.36765714945506E-01+I*(4.75340638410655E-02):d := 7.18681987966278E-01+I*(-4.75227111550141E-02):e := 1.70113574262973E-01+I*(2.51874348566185E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.24272164039441E-01+I*(2.79934919642746E-01):b := 4.16923522344845E-01+I*(5.63089620040490E-01):c := -4.71955071286198E-01+I*(3.40559894184542E-01):d := 6.41385463848131E-01+I*(-5.41113362278396E-02):e := 1.68650797470784E-01+I*(2.13007929670741E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.13882814487756E-01+I*(5.67516672336384E-02):b := 3.13515049683563E-01+I*(2.25154696529101E-01):c := -6.10660610918917E-01+I*(6.06690181929499E-01):d := 5.86407977636694E-01+I*(-1.08843763827654E-01):e := 1.83643753465063E-01+I*(1.83375001924670E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.15673570281746E-01+I*(-2.36095999844361E-01):b := 4.51519945543456E-01+I*(-1.00188158725916E-01):c := -8.87980470309154E-01+I*(7.21399607731381E-01):d := 5.79474106136999E-01+I*(-1.86110082797328E-01):e := 2.09699946850253E-01+I*(1.63895435542628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.28806516883367E-01+I*(-4.61581403526170E-01):b := 7.66364185398106E-01+I*(-2.60707407967663E-01):c := -1.17415360518129E+00+I*(6.31014356404224E-01):d := 6.23828284885150E-01+I*(-2.49756523771468E-01):e := 2.45901161785768E-01+I*(1.58168279270837E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.40718825373688E-01+I*(-5.14197417437948E-01):b := 1.11072865031556E+00+I*(-1.81294310503188E-01):c := -1.33527642526852E+00+I*(3.77826691564182E-01):d := 6.98716700703100E-01+I*(-2.70002209666874E-01):e := 2.88285702751645E-01+I*(1.77605814265466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.92032556311270E-01+I*(-6.09050107171975E-01):b := 1.21935249819537E+00+I*(1.54206840262946E-01):c := -1.43433803520400E+00+I*(2.33655084182100E-01):d := 1.02860082411693E+00+I*(-7.36648770398391E-02):e := 3.03354924442388E-01+I*(1.44967168556425E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.90189995239423E-01+I*(-3.34475789957732E-01):b := 1.20094412590780E+00+I*(5.07129574833148E-01):c := -1.21297554399117E+00+I*(3.10145051657800E-02):d := 1.06154316948692E+00+I*(-3.42981099287371E-03):e := 2.93472219034101E-01+I*(2.00364162726721E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.88667036300787E-01+I*(-5.86765236368458E-02):b := 9.59988133651631E-01+I*(7.65651400880060E-01):c := -9.13147184271219E-01+I*(1.80718822608658E-02):d := 1.04163223988041E+00+I*(7.15483025023465E-02):e := 2.42801008652830E-01+I*(2.21878269473004E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.41385177532349E-01+I*(8.92981499117229E-02):b := 6.09230508131076E-01+I*(8.08807082846276E-01):c := -6.75145977778145E-01+I*(2.00883212565798E-01):d := 9.78184580545608E-01+I*(1.16186370852496E-01):e := 2.03421801671921E-01+I*(2.01469720567403E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.30094792002573E-01+I*(4.02092363792884E-02):b := 3.12794640563992E-01+I*(6.16403597517822E-01):c := -6.10335334118837E-01+I*(4.93909042909274E-01):d := 9.00888056427461E-01+I*(1.09597745779671E-01):e := 1.89882882854649E-01+I*(1.69891205579778E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01970544245089E+00+I*(-1.82974016029819E-01):b := 2.09386167902710E-01+I*(2.78468674006434E-01):c := -7.49040873751557E-01+I*(7.60039330654231E-01):d := 8.45910570216024E-01+I*(5.48653181798565E-02):e := 1.93969665539280E-01+I*(1.41378014905441E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02149619824488E+00+I*(-4.75821683107819E-01):b := 3.47391063762603E-01+I*(-4.68741812485838E-02):c := -1.02636073314179E+00+I*(8.74748756456113E-01):d := 8.38976698716328E-01+I*(-2.24010007898171E-02):e := 2.09991494995236E-01+I*(1.19271498038402E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.34629144846499E-01+I*(-7.01307086789627E-01):b := 6.62235303617253E-01+I*(-2.07393430490331E-01):c := -1.31253386801393E+00+I*(7.84363505128956E-01):d := 8.83330877464479E-01+I*(-8.60474417639571E-02):e := 2.36518223466778E-01+I*(1.06368227348622E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.46541453336820E-01+I*(-7.53923100701406E-01):b := 1.00659976853471E+00+I*(-1.27980333025856E-01):c := -1.47365668810116E+00+I*(5.31175840288913E-01):d := 9.58219293282430E-01+I*(-1.06293127659363E-01):e := 2.72161239505514E-01+I*(1.10464474906095E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.19004693493284E-01+I*(-8.60712108788016E-01):b := 1.10531558279342E+00+I*(1.28114961430779E-01):c := -1.63891439934052E+00+I*(2.62178229045720E-01):d := 1.12216117362971E+00+I*(2.18548606711651E-01):e := 3.17590914146729E-01+I*(7.03809891370996E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.17162132421438E-01+I*(-5.86137791573773E-01):b := 1.08690721050585E+00+I*(4.81037696000982E-01):c := -1.41755190812770E+00+I*(5.95376500293996E-02):d := 1.15510351899970E+00+I*(2.88783672758616E-01):e := 3.33603335017950E-01+I*(1.22418690840741E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.15639173482802E-01+I*(-3.10338525252887E-01):b := 8.45951218249680E-01+I*(7.39559522047894E-01):c := -1.11772354840774E+00+I*(4.65950271244856E-02):d := 1.13519258939319E+00+I*(3.63761786253836E-01):e := 2.97240752039479E-01+I*(1.66325219587212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.68357314714363E-01+I*(-1.62363851704318E-01):b := 4.95193592729125E-01+I*(7.82715204014110E-01):c := -8.79722341914669E-01+I*(2.29406357429418E-01):d := 1.07174493005839E+00+I*(4.08399854603986E-01):e := 2.49411853198928E-01+I*(1.63982731578911E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.57066929184587E-01+I*(-2.11452765236753E-01):b := 1.98757725162040E-01+I*(5.90311718685655E-01):c := -8.14911698255360E-01+I*(5.22432187772894E-01):d := 9.94448405940239E-01+I*(4.01811229531161E-01):e := 2.23424524002153E-01+I*(1.37781047127123E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.46677579632902E-01+I*(-4.34636017645861E-01):b := 9.53492525007585E-02+I*(2.52376795174267E-01):c := -9.53617237888081E-01+I*(7.88562475517851E-01):d := 9.39470919728802E-01+I*(3.47078801931347E-01):e := 2.17389292240169E-01+I*(1.08363035555969E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.48468335426892E-01+I*(-7.27483684723860E-01):b := 2.33354148360651E-01+I*(-7.29660600807501E-02):c := -1.23093709727832E+00+I*(9.03271901319733E-01):d := 9.32537048229107E-01+I*(2.69812482961672E-01):e := 2.25302858969763E-01+I*(8.20953279931663E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.61601282028513E-01+I*(-9.52969088405669E-01):b := 5.48198388215301E-01+I*(-2.33485309322497E-01):c := -1.51711023215045E+00+I*(8.12886649992576E-01):d := 9.76891226977258E-01+I*(2.06166041987533E-01):e := 2.45284181515862E-01+I*(6.16811411335856E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.73513590518835E-01+I*(-1.00558510231745E+00):b := 8.92562853132755E-01+I*(-1.54072211858022E-01):c := -1.67823305223768E+00+I*(5.59698985152533E-01):d := 1.05177964279521E+00+I*(1.85920356092127E-01):e := 2.77861096224833E-01+I*(5.30595542967083E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.29688852100632E-03+I*(-1.00655498128889E+00):b := 1.03472977386608E+00+I*(3.48259063736185E-02):c := -1.81396331038842E+00+I*(1.52529073567094E-01):d := 1.00600135273144E+00+I*(5.02536555568673E-01):e := 3.51133860393991E-01+I*(-1.47881150305870E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00545672550840E-01+I*(-7.31980664074651E-01):b := 1.01632140157852E+00+I*(3.87748640943820E-01):c := -1.59260081917559E+00+I*(-5.01115054492255E-02):d := 1.03894369810144E+00+I*(5.72771621615638E-01):e := 3.96396490433573E-01+I*(4.65679458203628E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.06863148947626E-03+I*(-4.56181397753765E-01):b := 7.75365409322345E-01+I*(6.46270466990733E-01):c := -1.29277245945564E+00+I*(-6.30541283541397E-02):d := 1.01903276849492E+00+I*(6.47749735110859E-01):e := 3.77894645054353E-01+I*(1.18693556194396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.50649509742085E-01+I*(-3.08206724205197E-01):b := 4.24607783801790E-01+I*(6.89426148956949E-01):c := -1.05477125296257E+00+I*(1.19757201950792E-01):d := 9.55585109160124E-01+I*(6.92387803461008E-01):e := 3.16712275258703E-01+I*(1.39257445460744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.39359124212309E-01+I*(-3.57295637737631E-01):b := 1.28171916234705E-01+I*(4.97022663628494E-01):c := -9.89960609303258E-01+I*(4.12783032294268E-01):d := 8.78288585041976E-01+I*(6.85799178388184E-01):e := 2.73567341852057E-01+I*(1.17120254548313E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.28969774660624E-01+I*(-5.80478890146738E-01):b := 2.47634435734235E-02+I*(1.59087740117106E-01):c := -1.12866614893598E+00+I*(6.78913320039226E-01):d := 8.23311098830539E-01+I*(6.31066750788369E-01):e := 2.55633804880918E-01+I*(8.39446075064001E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.30760530454613E-01+I*(-8.73326557224738E-01):b := 1.62768339433316E-01+I*(-1.66255115137911E-01):c := -1.40598600832621E+00+I*(7.93622745841107E-01):d := 8.16377227330843E-01+I*(5.53800431818695E-01):e := 2.55463637864196E-01+I*(5.09331997312256E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.43893477056236E-01+I*(-1.09881196090655E+00):b := 4.77612579287966E-01+I*(-3.26774364379659E-01):c := -1.69215914319835E+00+I*(7.03237494513952E-01):d := 8.60731406078996E-01+I*(4.90153990844555E-01):e := 2.70023385169878E-01+I*(2.10624676188811E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.55805785546556E-01+I*(-1.15142797481833E+00):b := 8.21977044205421E-01+I*(-2.47361266915183E-01):c := -1.85328196328558E+00+I*(4.50049829673907E-01):d := 9.35619821896946E-01+I*(4.69908304949149E-01):e := 3.01302730524414E-01+I*(-1.27548909444314E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.59222957106295E-01+I*(-9.78337223768468E-01):b := 1.04062295588435E+00+I*(-8.20093392549332E-02):c := -1.87757743741644E+00+I*(-4.39863237907047E-02):d := 7.34473832593044E-01+I*(6.45417852086540E-01):e := 4.20800831952185E-01+I*(-7.92176401042303E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.61065518178142E-01+I*(-7.03762906554225E-01):b := 1.02221458359678E+00+I*(2.70913395315269E-01):c := -1.65621494620361E+00+I*(-2.46626902807025E-01):d := 7.67416177963039E-01+I*(7.15652918133506E-01):e := 5.14394971920357E-01+I*(-3.39461701913238E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.62588477116778E-01+I*(-4.27963640233339E-01):b := 7.81258591340610E-01+I*(5.29435221362182E-01):c := -1.35638658648366E+00+I*(-2.59569525711939E-01):d := 7.47505248356526E-01+I*(7.90631031628726E-01):e := 5.21692203062321E-01+I*(9.45823109939261E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.87033588521746E-03+I*(-2.79988966684770E-01):b := 4.30500965820056E-01+I*(5.72590903328397E-01):c := -1.11838537999058E+00+I*(-7.67581954070073E-02):d := 6.84057589021725E-01+I*(8.35269099978876E-01):e := 4.24251087815656E-01+I*(1.50664174779552E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.78839278585007E-01+I*(-3.29077880217204E-01):b := 1.34065098252971E-01+I*(3.80187417999943E-01):c := -1.05357473633127E+00+I*(2.16267634936469E-01):d := 6.06761064903577E-01+I*(8.28680474906051E-01):e := 3.49953000565013E-01+I*(1.24517589519950E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.68449929033322E-01+I*(-5.52261132626312E-01):b := 3.06566255916892E-02+I*(4.22524944885547E-02):c := -1.19228027596399E+00+I*(4.82397922681426E-01):d := 5.51783578692140E-01+I*(7.73948047306236E-01):e := 3.16265926888329E-01+I*(7.85238422216786E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70240684827312E-01+I*(-8.45108799704312E-01):b := 1.68661521451582E-01+I*(-2.83090360766462E-01):c := -1.46960013535423E+00+I*(5.97107348483308E-01):d := 5.44849707192445E-01+I*(6.96681728336562E-01):e := 3.08068464675651E-01+I*(3.17027666675727E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.83373631428934E-01+I*(-1.07059420338612E+00):b := 4.83505761306232E-01+I*(-4.43609610008210E-01):c := -1.75577327022636E+00+I*(5.06722097156151E-01):d := 5.89203885940596E-01+I*(6.33035287362422E-01):e := 3.19095933496802E-01+I*(-1.35607155815886E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.71406008074547E-03+I*(-1.12321021729790E+00):b := 8.27870226223686E-01+I*(-3.64196512543735E-01):c := -1.91689609031360E+00+I*(2.53534432316109E-01):d := 6.64092301758547E-01+I*(6.12789601467016E-01):e := 3.52831934158424E-01+I*(-5.53743382584476E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.75140555235862E-01+I*(-8.34526648694877E-01):b := 8.65535722967874E-01+I*(-1.10569039970911E-01):c := -1.63362187949799E+00+I*(-6.69392153914891E-01):d := 3.20249070076332E-01+I*(7.80600545264670E-01):e := 3.74289355084509E-01+I*(-3.28272133323622E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.76983116307708E-01+I*(-5.59952331480634E-01):b := 8.47127350680307E-01+I*(2.42353694599291E-01):c := -1.41225938828517E+00+I*(-8.72032732931211E-01):d := 3.53191415446328E-01+I*(8.50835611311635E-01):e := 4.86604814568913E-01+I*(-4.31414151432399E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.78506075246344E-01+I*(-2.84153065159747E-01):b := 6.06171358424135E-01+I*(5.00875520646204E-01):c := -1.11243102856521E+00+I*(-8.84975355836125E-01):d := 3.33280485839815E-01+I*(9.25813724806856E-01):e := 7.35578824963239E-01+I*(-3.81867990952518E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.25787934014783E-01+I*(-1.36178391611179E-01):b := 2.55413732903580E-01+I*(5.44031202612419E-01):c := -8.74429822072141E-01+I*(-7.02164025531193E-01):d := 2.69832826505014E-01+I*(9.70451793157006E-01):e := 7.54641643937552E-01+I*(-8.59917561032677E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.29216804554416E-02+I*(-1.85267305143614E-01):b := -4.10221346635049E-02+I*(3.51627717283965E-01):c := -8.09619178412832E-01+I*(-4.09138195187717E-01):d := 1.92536302386866E-01+I*(9.63863168084181E-01):e := 5.70939659983329E-01+I*(3.29058317945865E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.52532330903757E-01+I*(-4.08450557552721E-01):b := -1.44430607324787E-01+I*(1.36927937725768E-02):c := -9.48324718045552E-01+I*(-1.43007907442761E-01):d := 1.37558816175428E-01+I*(9.09130740484366E-01):e := 4.53722377780266E-01+I*(-3.16352716998763E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.54323086697746E-01+I*(-7.01298224630721E-01):b := -6.42571146489428E-03+I*(-3.11650061482441E-01):c := -1.22564457743579E+00+I*(-2.82984816408785E-02):d := 1.30624944675733E-01+I*(8.31864421514692E-01):e := 3.91066325770927E-01+I*(-9.05299314545647E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.74560332993680E-02+I*(-9.26783628312529E-01):b := 3.08418528389756E-01+I*(-4.72169310724189E-01):c := -1.51181771230792E+00+I*(-1.18683732968035E-01):d := 1.74979123423885E-01+I*(7.68217980540552E-01):e := 3.58180330705017E-01+I*(-1.56729478125669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20631658210311E-01+I*(-9.79399642224308E-01):b := 6.52782993307211E-01+I*(-3.92756213259714E-01):c := -1.67294053239516E+00+I*(-3.71871397808077E-01):d := 2.49867539241835E-01+I*(7.47972294645146E-01):e := 3.48515917574205E-01+I*(-2.33358670224768E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.92590285296378E-01+I*(-5.73064722736297E-01):b := 9.81619319006088E-01+I*(-1.25053616120078E-01):c := -1.45113846982605E+00+I*(-7.66164380047860E-01):d := 1.32388202446646E-01+I*(5.38009215039212E-01):e := 5.78788143328714E-01+I*(-4.93495762956338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.94432846368225E-01+I*(-2.98490405522054E-01):b := 9.63210946718522E-01+I*(2.27869118450125E-01):c := -1.22977597861322E+00+I*(-9.68804959064180E-01):d := 1.65330547816642E-01+I*(6.08244281086177E-01):e := 9.00368822063426E-01+I*(-7.70753168547054E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.95955805306860E-01+I*(-2.26911392011671E-02):b := 7.22254954462349E-01+I*(4.86390944497038E-01):c := -9.29947618893266E-01+I*(-9.81747581969095E-01):d := 1.45419618210129E-01+I*(6.83222394581398E-01):e := 1.74241925046472E+00+I*(-2.62326235766122E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43237664075299E-01+I*(1.25283534347401E-01):b := 3.71497328941794E-01+I*(5.29546626463253E-01):c := -6.91946412400193E-01+I*(-7.98936251664162E-01):d := 8.19719588753275E-02+I*(7.27860462931548E-01):e := 1.07685575160478E+00+I*(4.34771632169250E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54719503949253E-02+I*(7.61946208149666E-02):b := 7.50614613747096E-02+I*(3.37143141134799E-01):c := -6.27135768740884E-01+I*(-5.05910421320686E-01):d := 4.67543475717976E-03+I*(7.21271837858723E-01):e := 7.00036368402113E-01+I*(2.71461616316703E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.35082600843241E-01+I*(-1.46988631594141E-01):b := -2.83470112865726E-02+I*(-7.91782376589151E-04):c := -7.65841308373604E-01+I*(-2.39780133575729E-01):d := -5.03020514542573E-02+I*(6.66539410258908E-01):e := 5.73423870430954E-01+I*(1.08480173279256E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.36873356637230E-01+I*(-4.39836298672141E-01):b := 1.09657884573320E-01+I*(-3.26134637631607E-01):c := -1.04316116776384E+00+I*(-1.25070707773847E-01):d := -5.72359229539527E-02+I*(5.89273091289234E-01):e := 5.20390238243679E-01+I*(-2.45376154788816E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00063032388515E-02+I*(-6.65321702353949E-01):b := 4.24502124427971E-01+I*(-4.86653886873355E-01):c := -1.32933430263597E+00+I*(-2.15455959101004E-01):d := -1.28817442058011E-02+I*(5.25626650315094E-01):e := 4.99779497000764E-01+I*(-1.50976054479762E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.38081388270828E-01+I*(-7.17937716265728E-01):b := 7.68866589345425E-01+I*(-4.07240789408879E-01):c := -1.49045712272321E+00+I*(-4.68643623941047E-01):d := 6.20066716121491E-02+I*(5.05380964419688E-01):e := 5.08046527090898E-01+I*(-2.95231324588265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.37893067632208E-01+I*(-3.61556796993266E-01):b := 1.07985501876868E+00+I*(-6.15323479688572E-02):c := -1.24914407996539E+00+I*(-7.22998131414793E-01):d := 1.44413130005716E-01+I*(2.31418836513834E-01):e := 1.06090426857789E+00+I*(-1.90854634168249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.39735628704054E-01+I*(-8.69824797790226E-02):b := 1.06144664648111E+00+I*(2.91390386601345E-01):c := -1.02778158875256E+00+I*(-9.25638710431113E-01):d := 1.77355475375712E-01+I*(3.01653902560799E-01):e := 1.69778267360952E+00+I*(4.29597809920754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41258587642690E-01+I*(1.88816786541863E-01):b := 8.20490654224937E-01+I*(5.49912212648258E-01):c := -7.27953229032610E-01+I*(-9.38581333336027E-01):d := 1.57444545769198E-01+I*(3.76632016056020E-01):e := 8.03560665576636E-01+I*(1.02483609210818E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.85404464111291E-02+I*(3.36791460090432E-01):b := 4.69733028704382E-01+I*(5.93067894614473E-01):c := -4.89952022539537E-01+I*(-7.55770003031095E-01):d := 9.39968864343971E-02+I*(4.21270084406170E-01):e := 4.65357953856840E-01+I*(6.61728044556609E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.00169168059095E-01+I*(2.87702546557997E-01):b := 1.73297161137297E-01+I*(4.00664409286019E-01):c := -4.25141378880229E-01+I*(-4.62744172687619E-01):d := 1.67003623162491E-02+I*(4.14681459333345E-01):e := 4.27203943726619E-01+I*(4.33096089447422E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.89779818507411E-01+I*(6.45192941488898E-02):b := 6.98886884760149E-02+I*(6.27294857746303E-02):c := -5.63846918512948E-01+I*(-1.96613884942662E-01):d := -3.82771238951880E-02+I*(3.59949031733530E-01):e := 4.48055855561901E-01+I*(2.82731975968076E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91570574301400E-01+I*(-2.28328372929110E-01):b := 2.07893584335908E-01+I*(-2.62613369480387E-01):c := -8.41166777903184E-01+I*(-8.19044591407803E-02):d := -4.52109953948835E-02+I*(2.82682712763856E-01):e := 4.93676667109868E-01+I*(1.61417705773731E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.04703520903022E-01+I*(-4.53813776610918E-01):b := 5.22737824190558E-01+I*(-4.23132618722135E-01):c := -1.12733991277532E+00+I*(-1.72289710467937E-01):d := -8.56816646731719E-04+I*(2.19036271789716E-01):e := 5.69288199173338E-01+I*(4.39689737532106E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.33841706066577E-02+I*(-5.06429790522697E-01):b := 8.67102289108013E-01+I*(-3.43719521257659E-01):c := -1.28846273286255E+00+I*(-4.25477375307980E-01):d := 7.40315991712187E-02+I*(1.98790585894310E-01):e := 7.12239138473905E-01+I*(-8.55848696900712E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.34334496564825E-02+I*(-2.98969780569706E-01):b := 1.11427724656853E+00+I*(5.02724571545327E-02):c := -1.12215412984941E+00+I*(-5.60091375490518E-01):d := 3.50697255506468E-01+I*(4.28645517307218E-03):e := 7.01563366322203E-01+I*(2.28375637905909E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.85276010728329E-01+I*(-2.43954633554628E-02):b := 1.09586887428096E+00+I*(4.03195191724735E-01):c := -9.00791638636585E-01+I*(-7.62731954506838E-01):d := 3.83639600876464E-01+I*(7.45215212200375E-02):e := 6.69720939969457E-01+I*(5.21650197537195E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.67989696669649E-02+I*(2.51403802965423E-01):b := 8.54912882024791E-01+I*(6.61717017771648E-01):c := -6.00963278916630E-01+I*(-7.75674577411752E-01):d := 3.63728671269951E-01+I*(1.49499634715258E-01):e := 3.98249640846778E-01+I*(5.56921966889794E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.65919171564596E-01+I*(3.99378476513992E-01):b := 5.04155256504236E-01+I*(7.04872699737863E-01):c := -3.62962072423557E-01+I*(-5.92863247106820E-01):d := 3.00281011935149E-01+I*(1.94137703065408E-01):e := 2.91768667653362E-01+I*(4.28164049022947E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54628786034821E-01+I*(3.50289562981557E-01):b := 2.07719388937151E-01+I*(5.12469214409409E-01):c := -2.98151428764249E-01+I*(-2.99837416763344E-01):d := 2.22984487817001E-01+I*(1.87549077992583E-01):e := 2.82410188945164E-01+I*(3.23742025831271E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.44239436483136E-01+I*(1.27106310572450E-01):b := 1.04310916275869E-01+I*(1.74534290898020E-01):c := -4.36856968396968E-01+I*(-3.37071290183868E-02):d := 1.68007001605564E-01+I*(1.32816650392768E-01):e := 3.07151000353235E-01+I*(2.47814060229948E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.46030192277125E-01+I*(-1.65741356505550E-01):b := 2.42315812135762E-01+I*(-1.50808564356997E-01):c := -7.14176827787204E-01+I*(8.10022967834952E-02):d := 1.61073130105869E-01+I*(5.55503314230944E-02):e := 3.52198947222510E-01+I*(1.88756546445606E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.59163138878747E-01+I*(-3.91226760187359E-01):b := 5.57160051990412E-01+I*(-3.11327813598744E-01):c := -1.00034996265934E+00+I*(-9.38295454366141E-03):d := 2.05427308854020E-01+I*(-8.09610955104558E-03):e := 4.22773192440021E-01+I*(1.43185346424810E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.71075447369068E-01+I*(-4.43842774099137E-01):b := 9.01524516907867E-01+I*(-2.31914716134269E-01):c := -1.16147278274657E+00+I*(-2.62570619383704E-01):d := 2.80315724671971E-01+I*(-2.83417954464517E-02):e := 5.37965867654237E-01+I*(1.27623103319777E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.51724085376312E-01+I*(-4.14588834027408E-01):b := 1.06877945945765E+00+I*(1.58046088360860E-01):c := -1.12958862847346E+00+I*(-3.53669993878923E-01):d := 6.54717944034417E-01+I*(-3.71101634584927E-02):e := 4.64642756338823E-01+I*(1.48826657917281E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.98815243044657E-02+I*(-1.40014516813165E-01):b := 1.05037108717008E+00+I*(5.10968822931062E-01):c := -9.08226137260636E-01+I*(-5.56310572895243E-01):d := 6.87660289404413E-01+I*(3.31249025884725E-02):e := 4.68376497582685E-01+I*(2.73397750941442E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.48358565365830E-01+I*(1.35784749507721E-01):b := 8.09415094913911E-01+I*(7.69490648977975E-01):c := -6.08397777540681E-01+I*(-5.69253195800157E-01):d := 6.67749359797900E-01+I*(1.08103016083693E-01):e := 3.57548923617527E-01+I*(3.29431712289260E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.01076706597391E-01+I*(2.83759423056290E-01):b := 4.58657469393357E-01+I*(8.12646330944191E-01):c := -3.70396571047607E-01+I*(-3.86441865495226E-01):d := 6.04301700463098E-01+I*(1.52741084433843E-01):e := 2.77572468218219E-01+I*(2.85603534246139E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.89786321067615E-01+I*(2.34670509523855E-01):b := 1.62221601826272E-01+I*(6.20242845615736E-01):c := -3.05585927388299E-01+I*(-9.34160351517495E-02):d := 5.27005176344950E-01+I*(1.46152459361018E-01):e := 2.53525653422955E-01+I*(2.26534262344852E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.79396971515930E-01+I*(1.14872571147478E-02):b := 5.88131291649900E-02+I*(2.82307922104348E-01):c := -4.44291467021018E-01+I*(1.72714252593208E-01):d := 4.72027690133513E-01+I*(9.14200317612033E-02):e := 2.59052255783670E-01+I*(1.76630791725602E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.81187727309920E-01+I*(-2.81360409963252E-01):b := 1.96818025024883E-01+I*(-4.30349331506695E-02):c := -7.21611326411254E-01+I*(2.87423678395089E-01):d := 4.65093818633818E-01+I*(1.41537127915295E-02):e := 2.82468262189833E-01+I*(1.36643992406636E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.94320673911542E-01+I*(-5.06845813645060E-01):b := 5.11662264879533E-01+I*(-2.03554182392417E-01):c := -1.00778446128339E+00+I*(1.97038427067933E-01):d := 5.09447997381970E-01+I*(-4.94927281826107E-02):e := 3.23433060927683E-01+I*(1.07344089625317E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.06232982401862E-01+I*(-5.59461827556839E-01):b := 8.56026729796987E-01+I*(-1.24141084927942E-01):c := -1.16890728137062E+00+I*(-5.61492377721097E-02):d := 5.84336413199920E-01+I*(-6.97384140780167E-02):e := 3.87116877084725E-01+I*(9.95629408165276E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.57546713339444E-01+I*(-6.54314517290865E-01):b := 9.64650577676797E-01+I*(2.11360065838192E-01):c := -1.26796889130610E+00+I*(-2.00320845154191E-01):d := 9.14220536613746E-01+I*(1.26598918549018E-01):e := 3.78623120882763E-01+I*(5.20760226103003E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.55704152267598E-01+I*(-3.79740200076622E-01):b := 9.46242205389231E-01+I*(5.64282800408394E-01):c := -1.04660640009328E+00+I*(-4.02961424170511E-01):d := 9.47162881983743E-01+I*(1.96833984595983E-01):e := 4.11821421541433E-01+I*(1.21896674686160E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.54181193328962E-01+I*(-1.03940933755736E-01):b := 7.05286213133059E-01+I*(8.22804626455307E-01):c := -7.46778040373320E-01+I*(-4.15904047075425E-01):d := 9.27251952377230E-01+I*(2.71812098091203E-01):e := 3.64858242413365E-01+I*(1.90667052751273E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.06899334560523E-01+I*(4.40337397928323E-02):b := 3.54528587612503E-01+I*(8.65960308421522E-01):c := -5.08776833880247E-01+I*(-2.33092716770493E-01):d := 8.63804293042428E-01+I*(3.16450166441353E-01):e := 2.96561066095082E-01+I*(1.90073934383696E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.95608949030747E-01+I*(-5.05517373960193E-03):b := 5.80927200454189E-02+I*(6.73556823093068E-01):c := -4.43966190220939E-01+I*(5.99331135729830E-02):d := 7.86507768924280E-01+I*(3.09861541368528E-01):e := 2.60233019936749E-01+I*(1.55313478749929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.85219599479063E-01+I*(-2.28238426148710E-01):b := -4.53157526158632E-02+I*(3.35621899581680E-01):c := -5.82671729853658E-01+I*(3.26063401317940E-01):d := 7.31530282712843E-01+I*(2.55129113768714E-01):e := 2.50739095066808E-01+I*(1.16977802627541E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.87010355273052E-01+I*(-5.21086093226709E-01):b := 9.26891432440294E-02+I*(1.02790443266624E-02):c := -8.59991589243893E-01+I*(4.40772827119822E-01):d := 7.24596411213148E-01+I*(1.77862794799040E-01):e := 2.58667856106416E-01+I*(8.24957174929921E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.00143301874673E-01+I*(-7.46571496908518E-01):b := 4.07533383098680E-01+I*(-1.50240204915085E-01):c := -1.14616472411603E+00+I*(3.50387575792665E-01):d := 7.68950589961299E-01+I*(1.14216353824900E-01):e := 2.81632053242259E-01+I*(5.39085314206515E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.12055610364994E-01+I*(-7.99187510820296E-01):b := 7.51897848016134E-01+I*(-7.08271074506103E-02):c := -1.30728754420326E+00+I*(9.71999109526230E-02):d := 8.43839005779250E-01+I*(9.39706679294938E-02):e := 3.22151756703412E-01+I*(3.72796101039299E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84518850521459E-01+I*(-9.05976518906907E-01):b := 8.50613662274845E-01+I*(1.85268187006026E-01):c := -1.47254525544262E+00+I*(-1.71797700290571E-01):d := 1.00778088612653E+00+I*(4.18812402300508E-01):e := 3.40926489935512E-01+I*(-3.05574017002770E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.26762894496123E-02+I*(-6.31402201692664E-01):b := 8.32205289987279E-01+I*(5.38190921576228E-01):c := -1.25118276422980E+00+I*(-3.74438279306891E-01):d := 1.04072323149652E+00+I*(4.89047468347473E-01):e := 3.91992712152461E-01+I*(6.68875134937394E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.81153330510976E-01+I*(-3.55602935371777E-01):b := 5.91249297731107E-01+I*(7.96712747623141E-01):c := -9.51354404509844E-01+I*(-3.87380902211805E-01):d := 1.02081230189001E+00+I*(5.64025581842693E-01):e := 3.88364544654600E-01+I*(7.98110746329072E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.33871471742537E-01+I*(-2.07628261823209E-01):b := 2.40491672210552E-01+I*(8.39868429589356E-01):c := -7.13353198016770E-01+I*(-2.04569571906873E-01):d := 9.57364642555207E-01+I*(6.08663650192843E-01):e := 3.31483404726663E-01+I*(1.11959427442099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.22581086212762E-01+I*(-2.56717175355643E-01):b := -5.59441953565328E-02+I*(6.47464944260902E-01):c := -6.48542554357462E-01+I*(8.84562584366028E-02):d := 8.80068118437059E-01+I*(6.02075025120018E-01):e := 2.84332659222591E-01+I*(9.68854215829056E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.12191736661077E-01+I*(-4.79900427764751E-01):b := -1.59352668017815E-01+I*(3.09530020749514E-01):c := -7.87248093990182E-01+I*(3.54586546181560E-01):d := 8.25090632225622E-01+I*(5.47342597520204E-01):e := 2.61515855055763E-01+I*(6.62859667304722E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.13982492455066E-01+I*(-7.72748094842751E-01):b := -2.13477721579223E-02+I*(-1.58128345055038E-02):c := -1.06456795338042E+00+I*(4.69295971983442E-01):d := 8.18156760725926E-01+I*(4.70076278550530E-01):e := 2.56901713134710E-01+I*(3.36871743021793E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.27115439056688E-01+I*(-9.98233498524560E-01):b := 2.93496467696728E-01+I*(-1.76332083747251E-01):c := -1.35074108825255E+00+I*(3.78910720656285E-01):d := 8.62510939474078E-01+I*(4.06429837576390E-01):e := 2.67142555974048E-01+I*(2.73444187442176E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.39027747547009E-01+I*(-1.05084951243634E+00):b := 6.37860932614182E-01+I*(-9.69189862827764E-02):c := -1.51186390833979E+00+I*(1.25723055816242E-01):d := 9.37399355292028E-01+I*(3.86184151680984E-01):e := 2.94010349207231E-01+I*(-2.28597976884532E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.31889544508197E-02+I*(-1.05181939140779E+00):b := 7.80027853347510E-01+I*(9.19791319488640E-02):c := -1.64759416649052E+00+I*(-2.81446855769197E-01):d := 8.91621065228262E-01+I*(7.02800351157530E-01):e := 3.25148949758290E-01+I*(-1.10639606792784E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.35031515522666E-01+I*(-7.77245074193542E-01):b := 7.61619481059944E-01+I*(4.44901866519066E-01):c := -1.42623167527770E+00+I*(-4.84087434785516E-01):d := 9.24563410598258E-01+I*(7.73035417204495E-01):e := 3.89959761614700E-01+I*(-1.03082198023464E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.65544744613019E-02+I*(-5.01445807872656E-01):b := 5.20663488803772E-01+I*(7.03423692565979E-01):c := -1.12640331555774E+00+I*(-4.97030057690431E-01):d := 9.04652480991745E-01+I*(8.48013530699716E-01):e := 4.29276001774230E-01+I*(-3.13828638363144E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.16163666770259E-01+I*(-3.53471134324087E-01):b := 1.69905863283217E-01+I*(7.46579374532195E-01):c := -8.88402109064667E-01+I*(-3.14218727385499E-01):d := 8.41204821656944E-01+I*(8.92651599049866E-01):e := 3.88127339819400E-01+I*(3.60822724482460E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04873281240484E-01+I*(-4.02560047856522E-01):b := -1.26530004283868E-01+I*(5.54175889203741E-01):c := -8.23591465405359E-01+I*(-2.11928970420227E-02):d := 7.63908297538796E-01+I*(8.86062973977041E-01):e := 3.27850588529455E-01+I*(4.33782724771927E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.94483931688799E-01+I*(-6.25743300265629E-01):b := -2.29938476945150E-01+I*(2.16240965692352E-01):c := -9.62297005038079E-01+I*(2.44937390702934E-01):d := 7.08930811327358E-01+I*(8.31330546377226E-01):e := 2.89398298048826E-01+I*(1.96550918178915E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.96274687482788E-01+I*(-9.18590967343629E-01):b := -9.19335810852572E-02+I*(-1.09101889562665E-01):c := -1.23961686442831E+00+I*(3.59646816504816E-01):d := 7.01996939827663E-01+I*(7.54064227407552E-01):e := 2.71616296699545E-01+I*(-1.29634426660640E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.09407634084410E-01+I*(-1.14407637102544E+00):b := 2.22910658769393E-01+I*(-2.69621138804413E-01):c := -1.52578999930045E+00+I*(2.69261565177660E-01):d := 7.46351118575815E-01+I*(6.90417786433412E-01):e := 2.70039056381148E-01+I*(-4.80571915478613E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21319942574731E-01+I*(-1.19669238493722E+00):b := 5.67275123686847E-01+I*(-1.90208041339938E-01):c := -1.68691281938768E+00+I*(1.60739003376171E-02):d := 8.21239534393765E-01+I*(6.70172100538006E-01):e := 2.85622145826777E-01+I*(-8.31879114347167E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.93708800078121E-01+I*(-1.02360163388736E+00):b := 7.85921035365776E-01+I*(-2.48561136796875E-02):c := -1.71120829351854E+00+I*(-4.77962253126995E-01):d := 6.20093545089864E-01+I*(8.45681647675397E-01):e := 3.28897981757564E-01+I*(-2.02687326054323E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95551361149968E-01+I*(-7.49027316673116E-01):b := 7.67512663078210E-01+I*(3.28066620890515E-01):c := -1.48984580230571E+00+I*(-6.80602832143316E-01):d := 6.53035890459859E-01+I*(9.15916713722363E-01):e := 4.08809467055739E-01+I*(-2.33580513427696E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.97074320088604E-01+I*(-4.73228050352229E-01):b := 5.26556670822037E-01+I*(5.86588446937428E-01):c := -1.19001744258576E+00+I*(-6.93545455048230E-01):d := 6.33124960853346E-01+I*(9.90894827217583E-01):e := 5.09872176670674E-01+I*(-1.70347522412074E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.43561788570431E-02+I*(-3.25253376803661E-01):b := 1.75799045301483E-01+I*(6.29744128903644E-01):c := -9.52016236092684E-01+I*(-5.10734124743298E-01):d := 5.69677301518545E-01+I*(1.03553289556773E+00):e := 4.95473207788531E-01+I*(-4.51992756589011E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.44353435613182E-01+I*(-3.74342290336095E-01):b := -1.20636822265602E-01+I*(4.37340643575189E-01):c := -8.87205592433376E-01+I*(-2.17708294399822E-01):d := 4.92380777400397E-01+I*(1.02894427049491E+00):e := 4.08975531357571E-01+I*(-3.92063429552109E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.33964086061497E-01+I*(-5.97525542745203E-01):b := -2.24045294926884E-01+I*(9.94057200638010E-02):c := -1.02591113206610E+00+I*(4.84219933451349E-02):d := 4.37403291188960E-01+I*(9.74211842895094E-01):e := 3.44965484601000E-01+I*(-2.22814961698375E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.35754841855486E-01+I*(-8.90373209823202E-01):b := -8.60403990669916E-02+I*(-2.25937135191216E-01):c := -1.30323099145633E+00+I*(1.63131419147017E-01):d := 4.30469419689264E-01+I*(8.96945523925420E-01):e := 3.09203978594237E-01+I*(-5.89948659573675E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.48887788457108E-01+I*(-1.11585861350501E+00):b := 2.28803840787658E-01+I*(-3.86456384432964E-01):c := -1.58940412632846E+00+I*(7.27461678198609E-02):d := 4.74823598437416E-01+I*(8.33299082951280E-01):e := 2.93606684059952E-01+I*(-1.02377392468348E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.91999030525715E-02+I*(-1.16847462741679E+00):b := 5.73168305705113E-01+I*(-3.07043286968489E-01):c := -1.75052694641570E+00+I*(-1.80441497020182E-01):d := 5.49712014255366E-01+I*(8.13053397055874E-01):e := 2.97073814152695E-01+I*(-1.51063917143369E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.30653645594895E-01+I*(-8.47034125965626E-01):b := 6.33685346849500E-01+I*(-2.30506367785373E-01):c := -1.22722137102898E+00+I*(-8.94896978698626E-01):d := 1.03901599958854E-01+I*(8.60489281434001E-01):e := 1.83099734702379E-01+I*(-4.28018575407180E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.32496206666742E-01+I*(-5.72459808751383E-01):b := 6.15276974561935E-01+I*(1.22416366784829E-01):c := -1.00585887981615E+00+I*(-1.09753755771495E+00):d := 1.36843945328851E-01+I*(9.30724347480966E-01):e := 1.60370679982110E-01+I*(-5.51991011364952E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.34019165605378E-01+I*(-2.96660542430497E-01):b := 3.74320982305762E-01+I*(3.80938192831743E-01):c := -7.06030520096198E-01+I*(-1.11048018061986E+00):d := 1.16933015722337E-01+I*(1.00570246097619E+00):e := 2.50379755005231E-01+I*(-7.44724616232666E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.81301024373817E-01+I*(-1.48685868881928E-01):b := 2.35633567852071E-02+I*(4.24093874797958E-01):c := -4.68029313603124E-01+I*(-9.27668850314928E-01):d := 5.34853563875360E-02+I*(1.05034052932634E+00):e := 6.10771559150976E-01+I*(-7.59614469404773E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.40859009640805E-03+I*(-1.97774782414363E-01):b := -2.72872510781878E-01+I*(2.31690389469503E-01):c := -4.03218669943816E-01+I*(-6.34643019971451E-01):d := -2.38111677306120E-02+I*(1.04375190425351E+00):e := 6.83183543003126E-01+I*(-4.02792998665300E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.97019240544724E-01+I*(-4.20958034823471E-01):b := -3.76280983443160E-01+I*(-1.06244534041885E-01):c := -5.41924209576536E-01+I*(-3.68512732226494E-01):d := -7.87886539420490E-02+I*(9.89019476653697E-01):e := 5.12696593667021E-01+I*(-2.69561028808685E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.98809996338712E-01+I*(-7.13805701901470E-01):b := -2.38276087583267E-01+I*(-4.31587389296902E-01):c := -8.19244068966771E-01+I*(-2.53803306424613E-01):d := -8.57225254417445E-02+I*(9.11753157684023E-01):e := 3.85204951295650E-01+I*(-2.65070959470472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19429429403339E-02+I*(-9.39291105583279E-01):b := 7.65681522713836E-02+I*(-5.92106638538650E-01):c := -1.10541720383890E+00+I*(-3.44188557751769E-01):d := -4.13683466935931E-02+I*(8.48106716709883E-01):e := 2.98361996313363E-01+I*(-2.97979419212196E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.76144748569345E-01+I*(-9.91907119495057E-01):b := 4.20932617188838E-01+I*(-5.12693541074175E-01):c := -1.26654002392614E+00+I*(-5.97376222591812E-01):d := 3.35200691243575E-02+I*(8.27861030814477E-01):e := 2.33308144421349E-01+I*(-3.50534469082330E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.48103375655412E-01+I*(-5.85572200007046E-01):b := 7.49768942887715E-01+I*(-2.44990943934539E-01):c := -1.04473796135703E+00+I*(-9.91669204831595E-01):d := -8.39592676708316E-02+I*(6.17897951208543E-01):e := 1.41254098139152E-01+I*(-6.33627596244789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.49945936727258E-01+I*(-3.10997882792803E-01):b := 7.31360570600149E-01+I*(1.07931790635663E-01):c := -8.23375470144205E-01+I*(-1.19430978384791E+00):d := -5.10169223008353E-02+I*(6.88133017255508E-01):e := -1.68978857405275E-02+I*(-8.33567908928693E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.51468895665894E-01+I*(-3.51986164719164E-02):b := 4.90404578343976E-01+I*(3.66453616682577E-01):c := -5.23547110424249E-01+I*(-1.20725240675283E+00):d := -7.09278519073488E-02+I*(7.63111130750729E-01):e := -1.88873573007129E-01+I*(-1.33385039161257E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.98750754434333E-01+I*(1.12776057076652E-01):b := 1.39646952823422E-01+I*(4.09609298648792E-01):c := -2.85545903931176E-01+I*(-1.02444107644790E+00):d := -1.34375511242150E-01+I*(8.07749199100879E-01):e := 1.06226665023750E+00+I*(-2.61652916628093E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00411399641081E-02+I*(6.36871435442174E-02):b := -1.56788914743663E-01+I*(2.17205813320337E-01):c := -2.20735260271868E-01+I*(-7.31415246104420E-01):d := -2.11672035360298E-01+I*(8.01160574028054E-01):e := 1.59741493889619E+00+I*(-4.68136273475797E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.79569510484207E-01+I*(-1.59496108864890E-01):b := -2.60197387404945E-01+I*(-1.20729110191051E-01):c := -3.59440799904587E-01+I*(-4.65284958359463E-01):d := -2.66649521571735E-01+I*(7.46428146428239E-01):e := 8.87625129801085E-01+I*(-2.89344457987832E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.81360266278196E-01+I*(-4.52343775942890E-01):b := -1.22192491545052E-01+I*(-4.46071965446068E-01):c := -6.36760659294823E-01+I*(-3.50575532557581E-01):d := -2.73583393071430E-01+I*(6.69161827458565E-01):e := 5.91539868618851E-01+I*(-3.50024153626946E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.50678712018207E-03+I*(-6.77829179624699E-01):b := 1.92651748309598E-01+I*(-6.06591214687816E-01):c := -9.22933794166957E-01+I*(-4.40960783884738E-01):d := -2.29229214323279E-01+I*(6.05515386484425E-01):e := 4.14961223367065E-01+I*(-4.27776924829485E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.93594478629861E-01+I*(-7.30445193536477E-01):b := 5.37016213227053E-01+I*(-5.27178117223341E-01):c := -1.08405661425419E+00+I*(-6.94148448724781E-01):d := -1.54340798505328E-01+I*(5.85269700589019E-01):e := 2.76407996156891E-01+I*(-5.16202500321515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.93406157991241E-01+I*(-3.74064274264016E-01):b := 8.48004642650302E-01+I*(-1.81469675783320E-01):c := -8.42743571496375E-01+I*(-9.48502956198527E-01):d := -7.19343401117621E-02+I*(3.11307572683165E-01):e := 3.41670308115994E-01+I*(-1.12348073668560E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.95248719063088E-01+I*(-9.94899570497721E-02):b := 8.29596270362736E-01+I*(1.71453058786883E-01):c := -6.21381080283549E-01+I*(-1.15114353521485E+00):d := -3.89919947417661E-02+I*(3.81542638730130E-01):e := -4.09179650265358E-01+I*(-1.86964695901137E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.96771678001724E-01+I*(1.76309309271114E-01):b := 5.88640278106564E-01+I*(4.29974884833796E-01):c := -3.21552720563593E-01+I*(-1.16408615811976E+00):d := -5.89029243482794E-02+I*(4.56520752225351E-01):e := -4.93523829515972E+00+I*(-1.19125127762744E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.44053536770163E-01+I*(3.24283982819683E-01):b := 2.37882652586009E-01+I*(4.73130566800011E-01):c := -8.35515140705199E-02+I*(-9.81274827814829E-01):d := -1.22350583683081E-01+I*(5.01158820575501E-01):e := 3.46599795340498E-01+I*(2.72874678443482E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.44656077700062E-01+I*(2.75195069287248E-01):b := -5.85532149810759E-02+I*(2.80727081471557E-01):c := -1.87408704112119E-02+I*(-6.88248997471353E-01):d := -1.99647107801229E-01+I*(4.94570195502675E-01):e := 9.60112961414193E-01+I*(1.02038750751617E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.34266728148377E-01+I*(5.20118168781405E-02):b := -1.61961687642358E-01+I*(-5.72078420398315E-02):c := -1.57446410043931E-01+I*(-4.22118709726396E-01):d := -2.54624594012666E-01+I*(4.39837767902861E-01):e := 9.36572193983153E-01+I*(3.58925550310526E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.36057483942366E-01+I*(-2.40835850199859E-01):b := -2.39567917824652E-02+I*(-3.82550697294849E-01):c := -4.34766269434167E-01+I*(-3.07409283924514E-01):d := -2.61558465512361E-01+I*(3.62571448933187E-01):e := 8.56867173697880E-01+I*(-3.83555065292436E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.49190430543988E-01+I*(-4.66321253881668E-01):b := 2.90887448072185E-01+I*(-5.43069946536597E-01):c := -7.20939404306301E-01+I*(-3.97794535251671E-01):d := -2.17204286764209E-01+I*(2.98925007959047E-01):e := 7.53658510497622E-01+I*(-3.59516485715460E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.38897260965691E-01+I*(-5.18937267793447E-01):b := 6.35251912989640E-01+I*(-4.63656849072121E-01):c := -8.82062224393537E-01+I*(-6.50982200091714E-01):d := -1.42315870946259E-01+I*(2.78679322063641E-01):e := 6.07181248963926E-01+I*(-6.89985137964887E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.38946540015516E-01+I*(-3.11477257840455E-01):b := 8.82426870450156E-01+I*(-6.96648706599290E-02):c := -7.15753621380394E-01+I*(-7.85596200274252E-01):d := 1.34349785388990E-01+I*(8.41751913424030E-02):e := 1.41027045571193E+00+I*(-5.22317037177210E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.40789101087363E-01+I*(-3.69029406262121E-02):b := 8.64018498162590E-01+I*(2.83257863910273E-01):c := -4.94391130167569E-01+I*(-9.88236779290572E-01):d := 1.67292130758986E-01+I*(1.54410257389368E-01):e := 3.51542183807197E+00+I*(9.76907232519749E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42312060025999E-01+I*(2.38896325694674E-01):b := 6.23062505906418E-01+I*(5.41779689957186E-01):c := -1.94562770447614E-01+I*(-1.00117940219549E+00):d := 1.47381201152473E-01+I*(2.29388370884589E-01):e := 5.70675546901382E-01+I*(1.66453808067666E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10406081205562E-01+I*(3.86870999243243E-01):b := 2.72304880385863E-01+I*(5.84935371923402E-01):c := 4.34384360454600E-02+I*(-8.18368071890554E-01):d := 8.39335418176715E-02+I*(2.74026439234739E-01):e := 3.94110010132564E-01+I*(8.82898684161840E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.99115695675787E-01+I*(3.37782085710808E-01):b := -2.41309871812217E-02+I*(3.92531886594947E-01):c := 1.08249079704768E-01+I*(-5.25342241547078E-01):d := 6.63701769952351E-03+I*(2.67437814161913E-01):e := 4.39927541362919E-01+I*(5.61357801798243E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.88726346124102E-01+I*(1.14598833301700E-01):b := -1.27539459842504E-01+I*(5.45969630835587E-02):c := -3.04564599279515E-02+I*(-2.59211953802121E-01):d := -4.83404685119135E-02+I*(2.12705386562099E-01):e := 5.04089039545404E-01+I*(3.62832681394223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.90517101918091E-01+I*(-1.78248833776299E-01):b := 1.04654360173891E-02+I*(-2.70745892171459E-01):c := -3.07776319318187E-01+I*(-1.44502528000239E-01):d := -5.52743400116089E-02+I*(1.35439067592425E-01):e := 5.80055690098809E-01+I*(2.00192172222931E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.03650048519713E-01+I*(-4.03734237458108E-01):b := 3.25309675872040E-01+I*(-4.31265141413206E-01):c := -5.93949454190321E-01+I*(-2.34887779327395E-01):d := -1.09201612634571E-02+I*(7.17926266182850E-02):e := 6.84996388591272E-01+I*(3.20602410661071E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15562357010034E-01+I*(-4.56350251369886E-01):b := 6.69674140789494E-01+I*(-3.51852043948731E-01):c := -7.55072274277556E-01+I*(-4.88075444167438E-01):d := 6.39682545544933E-02+I*(5.15469407228791E-02):e := 8.74015347606972E-01+I*(-1.86053213420757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.62109950172784E-02+I*(-4.27096311298157E-01):b := 8.36929083339277E-01+I*(3.81087605463981E-02):c := -7.23188120004445E-01+I*(-5.79174818662658E-01):d := 4.38370473916939E-01+I*(4.27785727108382E-02):e := 7.76902162105123E-01+I*(-1.52595293165738E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.63156605456798E-03+I*(-1.52521994083914E-01):b := 8.18520711051711E-01+I*(3.91031495116601E-01):c := -5.01825628791619E-01+I*(-7.81815397678977E-01):d := 4.71312819286935E-01+I*(1.13013638757803E-01):e := 9.88952647565731E-01+I*(2.97642781685171E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.28454750067960E-02+I*(1.23277272236972E-01):b := 5.77564718795539E-01+I*(6.49553321163513E-01):c := -2.01997269071664E-01+I*(-7.94758020583892E-01):d := 4.51401889680422E-01+I*(1.87991752253024E-01):e := 6.66975720728345E-01+I*(5.84985421320866E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.45563616238357E-01+I*(2.71251945785541E-01):b := 2.26807093274984E-01+I*(6.92709003129729E-01):c := 3.60039374214093E-02+I*(-6.11946690278960E-01):d := 3.87954230345620E-01+I*(2.32629820603174E-01):e := 4.33994505915275E-01+I*(4.60167778101776E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.34273230708582E-01+I*(2.22163032253106E-01):b := -6.96287742921010E-02+I*(5.00305517801274E-01):c := 1.00814581080717E-01+I*(-3.18920859935483E-01):d := 3.10657706227473E-01+I*(2.26041195530349E-01):e := 3.77379005522642E-01+I*(3.23360271089907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.23883881156897E-01+I*(-1.02022015600143E-03):b := -1.73037246953383E-01+I*(1.62370594289886E-01):c := -3.78909585520021E-02+I*(-5.27905721905262E-02):d := 2.55680220016036E-01+I*(1.71308767930534E-01):e := 3.79237035756443E-01+I*(2.20673829783609E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.25674636950886E-01+I*(-2.93867887234001E-01):b := -3.50323510934902E-02+I*(-1.62972260965131E-01):c := -3.15210817942238E-01+I*(6.19188536113556E-02):d := 2.48746348516340E-01+I*(9.40424489608602E-02):e := 4.08111288985104E-01+I*(1.36555189821485E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.38807583552508E-01+I*(-5.19353290915810E-01):b := 2.79811888761160E-01+I*(-3.23491510206879E-01):c := -6.01383952814371E-01+I*(-2.84663977158009E-02):d := 2.93100527264492E-01+I*(3.03960079867202E-02):e := 4.64001690297671E-01+I*(5.99426729309954E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.50719892042829E-01+I*(-5.71969304827588E-01):b := 6.24176353678615E-01+I*(-2.44078412742404E-01):c := -7.62506772901607E-01+I*(-2.81654062555843E-01):d := 3.67988943082442E-01+I*(1.01503220913141E-02):e := 5.68799969250263E-01+I*(-8.84358125619979E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.02033622980411E-01+I*(-6.66821994561615E-01):b := 7.32800201558424E-01+I*(9.14227380237302E-02):c := -8.61568382837084E-01+I*(-4.25825669937925E-01):d := 6.97873066496269E-01+I*(2.06487654718349E-01):e := 5.07178274873923E-01+I*(-7.73759026143492E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00191061908564E-01+I*(-3.92247677347372E-01):b := 7.14391829270858E-01+I*(4.44345472593932E-01):c := -6.40205891624259E-01+I*(-6.28466248954244E-01):d := 7.30815411866265E-01+I*(2.76722720765314E-01):e := 6.37986069631016E-01+I*(4.21786247211891E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.98668102969928E-01+I*(-1.16448411026486E-01):b := 4.73435837014686E-01+I*(7.02867298640845E-01):c := -3.40377531904304E-01+I*(-6.41408871859159E-01):d := 7.10904482259752E-01+I*(3.51700834260534E-01):e := 6.10131942868114E-01+I*(1.94638012384800E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.51386244201489E-01+I*(3.15262625220830E-02):b := 1.22678211494130E-01+I*(7.46022980607061E-01):c := -1.02376325411230E-01+I*(-4.58597541554227E-01):d := 6.47456822924950E-01+I*(3.96338902610685E-01):e := 4.59708118584455E-01+I*(2.34914100165497E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.40095858671714E-01+I*(-1.75626510103513E-02):b := -1.73757656072954E-01+I*(5.53619495278606E-01):c := -3.75656817519221E-02+I*(-1.65571711210751E-01):d := 5.70160298806802E-01+I*(3.89750277537859E-01):e := 3.74870774200910E-01+I*(1.79913857497533E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.29706509120029E-01+I*(-2.40745903419459E-01):b := -2.77166128734236E-01+I*(2.15684571767218E-01):c := -1.76271221384642E-01+I*(1.00558576534206E-01):d := 5.15182812595365E-01+I*(3.35017849938045E-01):e := 3.44220225723750E-01+I*(1.15734680190992E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.31497264914018E-01+I*(-5.33593570497458E-01):b := -1.39161232874343E-01+I*(-1.09658283487799E-01):c := -4.53591080774877E-01+I*(2.15268002336088E-01):d := 5.08248941095670E-01+I*(2.57751530968371E-01):e := 3.42347627740897E-01+I*(5.64171267011166E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.44630211515641E-01+I*(-7.59078974179267E-01):b := 1.75683006980307E-01+I*(-2.70177532729547E-01):c := -7.39764215647011E-01+I*(1.24882751008932E-01):d := 5.52603119843822E-01+I*(1.94105089994231E-01):e := 3.62322022484462E-01+I*(6.76999670869674E-04):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56542520005961E-01+I*(-8.11694988091046E-01):b := 5.20047471897761E-01+I*(-1.90764435265072E-01):c := -9.00887035734246E-01+I*(-1.28304913831111E-01):d := 6.27491535661772E-01+I*(1.73859404098825E-01):e := 4.10781305050282E-01+I*(-5.07117683266497E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.29005760162425E-01+I*(-9.18483996177656E-01):b := 6.18763286156472E-01+I*(6.53308591915635E-02):c := -1.06614474697361E+00+I*(-3.97302525074305E-01):d := 7.91433416009048E-01+I*(4.98701138469838E-01):e := 3.82478313915583E-01+I*(-1.55287407697123E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.71631990905786E-02+I*(-6.43909678963413E-01):b := 6.00354913868906E-01+I*(4.18253593761766E-01):c := -8.44782255760782E-01+I*(-5.99943104090625E-01):d := 8.24375761379044E-01+I*(5.68936204516804E-01):e := 4.80655082524795E-01+I*(-1.54765063559323E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.25640240151943E-01+I*(-3.68110412642527E-01):b := 3.59398921612734E-01+I*(6.76775419808679E-01):c := -5.44953896040827E-01+I*(-6.12885726995539E-01):d := 8.04464831772530E-01+I*(6.43914318012024E-01):e := 5.50483157620205E-01+I*(-4.35340685455039E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78358381383504E-01+I*(-2.20135739093958E-01):b := 8.64129609217892E-03+I*(7.19931101774894E-01):c := -3.06952689547753E-01+I*(-4.30074396690608E-01):d := 7.41017172437729E-01+I*(6.88552386362174E-01):e := 4.81528524742515E-01+I*(6.22598870376077E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.67067995853728E-01+I*(-2.69224652626393E-01):b := -2.87794571474906E-01+I*(5.27527616446440E-01):c := -2.42142045888445E-01+I*(-1.37048566347131E-01):d := 6.63720648319581E-01+I*(6.81963761289349E-01):e := 3.90940677465802E-01+I*(6.65634062911952E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.56678646302044E-01+I*(-4.92407905035500E-01):b := -3.91203044136188E-01+I*(1.89592692935052E-01):c := -3.80847585521165E-01+I*(1.29081721397826E-01):d := 6.08743162108144E-01+I*(6.27231333689534E-01):e := 3.38881257001232E-01+I*(3.01215025089863E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.58469402096033E-01+I*(-7.85255572113500E-01):b := -2.53198148276295E-01+I*(-1.35750162319966E-01):c := -6.58167444911401E-01+I*(2.43791147199708E-01):d := 6.01809290608449E-01+I*(5.49965014719860E-01):e := 3.15610178088085E-01+I*(-1.48435365156649E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.71602348697654E-01+I*(-1.01074097579531E+00):b := 6.16460915783552E-02+I*(-2.96269411561713E-01):c := -9.44340579783534E-01+I*(1.53405895872551E-01):d := 6.46163469356600E-01+I*(4.86318573745721E-01):e := 3.12556033794999E-01+I*(-6.21698563409022E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.83514657187976E-01+I*(-1.06335698970709E+00):b := 4.06010556495810E-01+I*(-2.16856314097238E-01):c := -1.10546339987077E+00+I*(-9.97817689674913E-02):d := 7.21051885174551E-01+I*(4.66072887850315E-01):e := 3.30826579106237E-01+I*(-1.11270563002164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.87020448098534E-02+I*(-1.06432686867853E+00):b := 5.48177477229137E-01+I*(-2.79581958655976E-02):c := -1.24119365802151E+00+I*(-5.06951680552931E-01):d := 6.75273595110784E-01+I*(7.82689087326861E-01):e := 3.03246243461873E-01+I*(-2.30346336980741E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.90544605881699E-01+I*(-7.89752551464291E-01):b := 5.29769104941571E-01+I*(3.24964538704605E-01):c := -1.01983116680868E+00+I*(-7.09592259569251E-01):d := 7.08215940480781E-01+I*(8.52924153373826E-01):e := 3.72603168708627E-01+I*(-2.76303202268258E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.20675648203357E-02+I*(-5.13953285143405E-01):b := 2.88813112685399E-01+I*(5.83486364751518E-01):c := -7.20002807088725E-01+I*(-7.22534882474165E-01):d := 6.88305010874267E-01+I*(9.27902266869047E-01):e := 4.85721879015572E-01+I*(-2.41082914521822E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.60650576411225E-01+I*(-3.65978611594837E-01):b := -6.19445128351562E-02+I*(6.26642046717733E-01):c := -4.82001600595651E-01+I*(-5.39723552169233E-01):d := 6.24857351539466E-01+I*(9.72540335219197E-01):e := 5.05196880538044E-01+I*(-1.10449273278872E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.49360190881450E-01+I*(-4.15067525127271E-01):b := -3.58380380402241E-01+I*(4.34238561389279E-01):c := -4.17190956936343E-01+I*(-2.46697721825757E-01):d := 5.47560827421318E-01+I*(9.65951710146371E-01):e := 4.23719166114443E-01+I*(-4.61165311595618E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.38970841329765E-01+I*(-6.38250777536379E-01):b := -4.61788853063523E-01+I*(9.63036378778906E-02):c := -5.55896496569062E-01+I*(1.94325659192006E-02):d := 4.92583341209881E-01+I*(9.11219282546557E-01):e := 3.52490755411635E-01+I*(-5.29663641051347E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.40761597123755E-01+I*(-9.31098444614378E-01):b := -3.23783957203630E-01+I*(-2.29039217377127E-01):c := -8.33216355959298E-01+I*(1.34141991721082E-01):d := 4.85649469710186E-01+I*(8.33952963576883E-01):e := 3.09144072644365E-01+I*(-8.48697594725144E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.53894543725377E-01+I*(-1.15658384829619E+00):b := -8.93971734897989E-03+I*(-3.89558466618875E-01):c := -1.11938949083143E+00+I*(4.37567403939262E-02):d := 5.30003648458338E-01+I*(7.70306522602743E-01):e := 2.86314749128037E-01+I*(-1.26235582295491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.65806852215697E-01+I*(-1.20919986220797E+00):b := 3.35424747568475E-01+I*(-3.10145369154399E-01):c := -1.28051231091867E+00+I*(-2.09430924446117E-01):d := 6.04892064276288E-01+I*(7.50060836707337E-01):e := 2.81738328366981E-01+I*(-1.74893201178877E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.49221890437156E-01+I*(-1.03610911115811E+00):b := 5.54070659247403E-01+I*(-1.44793441494149E-01):c := -1.30480778504952E+00+I*(-7.03467077910730E-01):d := 4.03746074972386E-01+I*(9.25570383844729E-01):e := 2.40348455601712E-01+I*(-3.13805572192966E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.51064451509002E-01+I*(-7.61534793943865E-01):b := 5.35662286959837E-01+I*(2.08129293076053E-01):c := -1.08344529383670E+00+I*(-9.06107656927050E-01):d := 4.36688420342382E-01+I*(9.95805449891694E-01):e := 2.74546373124695E-01+I*(-3.96889067340789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.52587410447638E-01+I*(-4.85735527622979E-01):b := 2.94706294703665E-01+I*(4.66651119122967E-01):c := -7.83616934116742E-01+I*(-9.19050279831964E-01):d := 4.16777490735869E-01+I*(1.07078356338691E+00):e := 4.00328580144295E-01+I*(-4.51641327332249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.98692692160770E-02+I*(-3.37760854074410E-01):b := -5.60513308168905E-02+I*(5.09806801089182E-01):c := -5.45615727623668E-01+I*(-7.36238949527032E-01):d := 3.53329831401067E-01+I*(1.11542163173706E+00):e := 5.38883094971826E-01+I*(-3.35939632374732E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.88840345254148E-01+I*(-3.86849767606845E-01):b := -3.52487198383975E-01+I*(3.17403315760727E-01):c := -4.80805083964360E-01+I*(-4.43213119183556E-01):d := 2.76033307282919E-01+I*(1.10883300666424E+00):e := 4.91437845175411E-01+I*(-1.86099392331217E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78450995702463E-01+I*(-6.10033020015952E-01):b := -4.55895671045257E-01+I*(-2.05316077506608E-02):c := -6.19510623597079E-01+I*(-1.77082831438599E-01):d := 2.21055821071482E-01+I*(1.05410057906442E+00):e := 3.94190964730950E-01+I*(-1.48508125856274E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.80241751496452E-01+I*(-9.02880687093952E-01):b := -3.17890775185364E-01+I*(-3.45874463005678E-01):c := -8.96830482987315E-01+I*(-6.23734056367172E-02):d := 2.14121949571787E-01+I*(9.76834260094751E-01):e := 3.23893349295549E-01+I*(-1.64352979518817E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.93374698098074E-01+I*(-1.12836609077576E+00):b := -3.04653533071417E-03+I*(-5.06393712247426E-01):c := -1.18300361785945E+00+I*(-1.52758656963873E-01):d := 2.58476128319939E-01+I*(9.13187819120611E-01):e := 2.77504459747116E-01+I*(-2.00027172491665E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.47129934116051E-02+I*(-1.18098210468754E+00):b := 3.41317929586741E-01+I*(-4.26980614782951E-01):c := -1.34412643794668E+00+I*(-4.05946321803916E-01):d := 3.33364544137889E-01+I*(8.92942133225205E-01):e := 2.48691469927950E-01+I*(-2.48841469647111E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.81218791402868E-01+I*(-8.20932282768124E-01):b := 5.33171882847025E-01+I*(-4.71414240350235E-01):c := -7.70948812540044E-01+I*(-8.06414485206530E-01):d := -1.13181667070651E-01+I*(7.82622130665771E-01):e := -1.97786257025177E-02+I*(-4.88050536927172E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.83061352474714E-01+I*(-5.46357965553881E-01):b := 5.14763510559459E-01+I*(-1.18491505780032E-01):c := -5.49586321327218E-01+I*(-1.00905506422285E+00):d := -8.02393217006548E-02+I*(8.52857196712736E-01):e := -1.37054931277250E-01+I*(-5.39469431719190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.84584311413351E-01+I*(-2.70558699232995E-01):b := 2.73807518303286E-01+I*(1.40030320266881E-01):c := -2.49757961607263E-01+I*(-1.02199768712776E+00):d := -1.00150251307168E-01+I*(9.27835310207957E-01):e := -2.74295412668350E-01+I*(-6.70884688717126E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.31866170181790E-01+I*(-1.22584025684427E-01):b := -7.69501072172683E-02+I*(1.83186002233096E-01):c := -1.17567551141894E-02+I*(-8.39186356822832E-01):d := -1.63597910641969E-01+I*(9.72473378558107E-01):e := -3.39761070203396E-01+I*(-1.03791288772085E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.31565557115648E-02+I*(-1.71672939216861E-01):b := -3.73385974784353E-01+I*(-9.21748309535812E-03):c := 5.30538885451188E-02+I*(-5.46160526479356E-01):d := -2.40894434760117E-01+I*(9.65884753485282E-01):e := 2.98519578810392E-01+I*(-1.33983502051134E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.46454094736750E-01+I*(-3.94856191625969E-01):b := -4.76794447445636E-01+I*(-3.47152406606747E-01):c := -8.56516510876006E-02+I*(-2.80030238734399E-01):d := -2.95871920971555E-01+I*(9.11152325885467E-01):e := 5.33897484555750E-01+I*(-7.77377576982362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.48244850530739E-01+I*(-6.87703858703968E-01):b := -3.38789551585742E-01+I*(-6.72495261861764E-01):c := -3.62971510477836E-01+I*(-1.65320812932517E-01):d := -3.02805792471250E-01+I*(8.33886006915793E-01):e := 3.56163146909646E-01+I*(-5.47891780338800E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.86222028676388E-02+I*(-9.13189262385777E-01):b := -2.39453117310920E-02+I*(-8.33014511103512E-01):c := -6.49144645349970E-01+I*(-2.55706064259674E-01):d := -2.58451613723098E-01+I*(7.70239565941653E-01):e := 2.07641596435837E-01+I*(-4.83382985367907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.26709894377318E-01+I*(-9.65805276297556E-01):b := 3.20419153186363E-01+I*(-7.53601413639037E-01):c := -8.10267465437206E-01+I*(-5.08893729099717E-01):d := -1.83563197905148E-01+I*(7.49993880046247E-01):e := 8.93499156425052E-02+I*(-4.71426748346481E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.98668521463384E-01+I*(-5.59470356809544E-01):b := 6.49255478885239E-01+I*(-4.85898816499400E-01):c := -5.88465402868095E-01+I*(-9.03186711339499E-01):d := -3.01042534700337E-01+I*(5.40030800440314E-01):e := -2.09453028988109E-01+I*(-5.56410531990444E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.00511082535231E-01+I*(-2.84896039595301E-01):b := 6.30847106597673E-01+I*(-1.32976081929198E-01):c := -3.67102911655270E-01+I*(-1.10582729035582E+00):d := -2.68100189330340E-01+I*(6.10265866487279E-01):e := -3.77963098416484E-01+I*(-5.04123696328284E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.02034041473867E-01+I*(-9.09677327441524E-03):b := 3.89891114341501E-01+I*(1.25545744117715E-01):c := -6.72745519353151E-02+I*(-1.11876991326073E+00):d := -2.88011118936854E-01+I*(6.85243979982499E-01):e := -6.02094399352809E-01+I*(-4.70116569280436E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.49315900242306E-01+I*(1.38877900274153E-01):b := 3.91334888209460E-02+I*(1.68701426083930E-01):c := 1.70726654557759E-01+I*(-9.35958582955801E-01):d := -3.51458778271655E-01+I*(7.29882048332649E-01):e := -1.00533974524854E+00+I*(-5.04580130163846E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.06062857720813E-02+I*(8.97889867417190E-02):b := -2.57302378746139E-01+I*(-2.37020592445239E-02):c := 2.35537298217067E-01+I*(-6.42932752612325E-01):d := -4.28755302389803E-01+I*(7.23293423259824E-01):e := -1.94281216963156E+00+I*(-1.32539387772434E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.29004364676234E-01+I*(-1.33394265667389E-01):b := -3.60710851407421E-01+I*(-3.61636982755912E-01):c := 9.68317585843474E-02+I*(-3.76802464867368E-01):d := -4.83732788601240E-01+I*(6.68560995660010E-01):e := 5.32125720657656E-01+I*(-2.36379690006424E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.30795120470223E-01+I*(-4.26241932745388E-01):b := -2.22705955547528E-01+I*(-6.86979838010930E-01):c := -1.80488100805888E-01+I*(-2.62093039065486E-01):d := -4.90666660100936E-01+I*(5.91294676690336E-01):e := 4.24638115674515E-01+I*(-1.06247140661671E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.60719329281552E-02+I*(-6.51727336427197E-01):b := 9.21382843071226E-02+I*(-8.47499087252677E-01):c := -4.66661235678022E-01+I*(-3.52478290392643E-01):d := -4.46312481352784E-01+I*(5.27648235716195E-01):e := 1.42875355308090E-01+I*(-7.57329560492451E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.44159624437834E-01+I*(-7.04343350338975E-01):b := 4.36502749224577E-01+I*(-7.68085989788202E-01):c := -6.27784055765257E-01+I*(-6.05665955232685E-01):d := -3.71424065534833E-01+I*(5.07402549820789E-01):e := -4.86456654149197E-02+I*(-6.30675561913741E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.43971303799215E-01+I*(-3.47962431066514E-01):b := 7.47491178647827E-01+I*(-4.22377548348181E-01):c := -3.86471013007440E-01+I*(-8.60020462706432E-01):d := -2.89017607141268E-01+I*(2.33440421914936E-01):e := -5.45585439557151E-01+I*(-7.10424547396222E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.45813864871061E-01+I*(-7.33881138522705E-02):b := 7.29082806360261E-01+I*(-6.94548137779786E-02):c := -1.65108521794614E-01+I*(-1.06266104172275E+00):d := -2.56075261771271E-01+I*(3.03675487961901E-01):e := -7.32977548329865E-01+I*(-4.09757610010363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.47336823809697E-01+I*(2.02411152468616E-01):b := 4.88126814104088E-01+I*(1.89067012268934E-01):c := 1.34719837925341E-01+I*(-1.07560366462767E+00):d := -2.75986191377785E-01+I*(3.78653601457121E-01):e := -8.83842480365353E-01+I*(-9.23076932943430E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.94618682578136E-01+I*(3.50385826017184E-01):b := 1.37369188583533E-01+I*(2.32222694235150E-01):c := 3.72721044418415E-01+I*(-8.92792334322735E-01):d := -3.39433850712586E-01+I*(4.23291669807271E-01):e := -1.02324804856092E+00+I*(3.36438496833459E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.40909318920888E-02+I*(3.01296912484750E-01):b := -1.59066678983552E-01+I*(3.98192089066953E-02):c := 4.37531688077723E-01+I*(-5.99766503979258E-01):d := -4.16730374830734E-01+I*(4.16703044734446E-01):e := -1.11294126829937E+00+I*(1.13955961635679E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.83701582340404E-01+I*(7.81136600756420E-02):b := -2.62475151644834E-01+I*(-2.98115714604693E-01):c := 2.98826148445003E-01+I*(-3.33636216234301E-01):d := -4.71707861042171E-01+I*(3.61970617134632E-01):e := 3.96279366942040E-02+I*(3.49467426598355E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.85492338134393E-01+I*(-2.14734007002357E-01):b := -1.24470255784941E-01+I*(-6.23458569859710E-01):c := 2.15062890547679E-02+I*(-2.18926790432419E-01):d := -4.78641732541866E-01+I*(2.84704298164958E-01):e := 3.32657646918870E+00+I*(-1.72404697375446E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.86252847360148E-02+I*(-4.40219410684166E-01):b := 1.90373984069710E-01+I*(-7.83977819101458E-01):c := -2.64666845817366E-01+I*(-3.09312041759576E-01):d := -4.34287553793715E-01+I*(2.21057857190818E-01):e := 4.17082656209147E-01+I*(-1.59668556541370E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.89462406773665E-01+I*(-4.92835424595945E-01):b := 5.34738448987165E-01+I*(-7.04564721636983E-01):c := -4.25789665904602E-01+I*(-5.62499706599619E-01):d := -3.59399137975764E-01+I*(2.00812171295412E-01):e := -2.51392797103981E-01+I*(-1.06760588935623E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.89511685823489E-01+I*(-2.85375414642954E-01):b := 7.81913406447681E-01+I*(-3.10572743224791E-01):c := -2.59481062891459E-01+I*(-6.97113706782157E-01):d := -8.27334816405153E-02+I*(6.30804057417357E-03):e := -1.65767700902086E+00+I*(-1.64361775081876E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.91354246895336E-01+I*(-1.08010974287105E-02):b := 7.63505034160115E-01+I*(4.23499913454117E-02):c := -3.81185716786339E-02+I*(-8.99754285798477E-01):d := -4.97911362705192E-02+I*(7.65431066211389E-02):e := -1.50672965239602E+00+I*(6.14970773834440E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.92877205833972E-01+I*(2.64998168892176E-01):b := 5.22549041903942E-01+I*(3.00871817392325E-01):c := 2.61709788041321E-01+I*(-9.12696908703391E-01):d := -6.97020658770325E-02+I*(1.51521220116359E-01):e := -9.64623982418355E-01+I*(6.05815946703865E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.98409353975891E-02+I*(4.12972842440744E-01):b := 1.71791416383387E-01+I*(3.44027499358540E-01):c := 4.99710994534395E-01+I*(-7.29885578398459E-01):d := -1.33149725211834E-01+I*(1.96159288466509E-01):e := -4.96394840027144E-01+I*(8.56909319337637E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.48550549867814E-01+I*(3.63883928908310E-01):b := -1.24644451183697E-01+I*(1.51624014030086E-01):c := 5.64521638193703E-01+I*(-4.36859748054983E-01):d := -2.10446249329982E-01+I*(1.89570663393684E-01):e := -5.87069067810665E-02+I*(9.64546547599041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.38161200316129E-01+I*(1.40700676499202E-01):b := -2.28052923844979E-01+I*(-1.86310909481303E-01):c := 4.25816098560984E-01+I*(-1.70729460310026E-01):d := -2.65423735541419E-01+I*(1.34838235793870E-01):e := 4.20946787338029E-01+I*(9.66139889611318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.39951956110118E-01+I*(-1.52146990578797E-01):b := -9.00480279850866E-02+I*(-5.11653764736320E-01):c := 1.48496239170748E-01+I*(-5.60200345081438E-02):d := -2.72357607041114E-01+I*(5.75719168241956E-02):e := 1.04214934574656E+00+I*(7.84051717590440E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.53084902711740E-01+I*(-3.77632394260606E-01):b := 2.24796211869564E-01+I*(-6.72173013978068E-01):c := -1.37676895701386E-01+I*(-1.46405285835300E-01):d := -2.28003428292963E-01+I*(-6.07452414994443E-03):e := 1.89058768770917E+00+I*(-8.92305001869887E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.49972112020609E-02+I*(-4.30248408172385E-01):b := 5.69160676787019E-01+I*(-5.92759916513592E-01):c := -2.98799715788621E-01+I*(-3.99592950675343E-01):d := -1.53115012475012E-01+I*(-2.63202100453504E-02):e := 1.38954936321013E+00+I*(-2.52978463849667E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56458492093052E-02+I*(-4.00994468100656E-01):b := 7.36415619336801E-01+I*(-2.02799112018463E-01):c := -2.66915561515510E-01+I*(-4.90692325170563E-01):d := 2.21287206887434E-01+I*(-3.50885780573911E-02):e := 2.60031710580916E+00+I*(-6.95110594943943E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.61967118625410E-02+I*(-1.26420150886412E-01):b := 7.18007247049235E-01+I*(1.50123622551739E-01):c := -4.55530703026844E-02+I*(-6.93332904186882E-01):d := 2.54229552257430E-01+I*(3.51464879895741E-02):e := -1.29329773328593E-02+I*(4.79891324919751E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.22803291988229E-02+I*(1.49379115434474E-01):b := 4.77051254793063E-01+I*(4.08645448598652E-01):c := 2.54275289417271E-01+I*(-7.06275527091797E-01):d := 2.34318622650916E-01+I*(1.10124601484794E-01):e := -1.75071491711683E-01+I*(1.46591251424577E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.94998470430384E-01+I*(2.97353788983042E-01):b := 1.26293629272508E-01+I*(4.51801130564867E-01):c := 4.92276495910344E-01+I*(-5.23464196786865E-01):d := 1.70870963316115E-01+I*(1.54762669834944E-01):e := 1.31912478833797E-01+I*(9.07224123042699E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.83708084900609E-01+I*(2.48264875450608E-01):b := -1.70142238294577E-01+I*(2.59397645236413E-01):c := 5.57087139569653E-01+I*(-2.30438366443388E-01):d := 9.35744391979672E-02+I*(1.48174044762119E-01):e := 3.16848941978264E-01+I*(6.53812419297346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.73318735348924E-01+I*(2.50816230414999E-02):b := -2.73550710955859E-01+I*(-7.85372782749755E-02):c := 4.18381599936933E-01+I*(3.56919213015688E-02):d := 3.85969529865303E-02+I*(9.34416171623046E-02):e := 4.64634236300897E-01+I*(4.79544934703176E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.75109491142913E-01+I*(-2.67766044036500E-01):b := -1.35545815095966E-01+I*(-4.03880133529993E-01):c := 1.41061740546697E-01+I*(1.50401347103451E-01):d := 3.16630814868350E-02+I*(1.61752981926308E-02):e := 6.15690271602603E-01+I*(3.21709648300172E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.88242437744535E-01+I*(-4.93251447718308E-01):b := 1.79298424758685E-01+I*(-5.64399382771740E-01):c := -1.45111394325436E-01+I*(6.00160957762941E-02):d := 7.60172602349868E-02+I*(-4.74711427815091E-02):e := 8.15215130345582E-01+I*(1.38946912172291E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.00154746234855E-01+I*(-5.45867461630087E-01):b := 5.23662889676139E-01+I*(-4.84986285307265E-01):c := -3.06234214412672E-01+I*(-1.93171569063749E-01):d := 1.50905676052937E-01+I*(-6.77168286769152E-02):e := 1.18837035018010E+00+I*(-1.40329908386744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.51468477172437E-01+I*(-6.40720151364113E-01):b := 6.32286737555948E-01+I*(-1.49485134541131E-01):c := -4.05295824348149E-01+I*(-3.37343176445830E-01):d := 4.80789799466763E-01+I*(1.28620503950119E-01):e := 8.83252657592348E-01+I*(-3.22356281890141E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.96259161005911E-02+I*(-3.66145834149870E-01):b := 6.13878365268382E-01+I*(2.03437600029071E-01):c := -1.83933333135324E-01+I*(-5.39983755462150E-01):d := 5.13732144836760E-01+I*(1.98855569997085E-01):e := 1.54965649262878E+00+I*(-1.46121947765356E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.48102957161955E-01+I*(-9.03465678289837E-02):b := 3.72922373012210E-01+I*(4.61959426075984E-01):c := 1.15895026584631E-01+I*(-5.52926378367064E-01):d := 4.93821215230246E-01+I*(2.73833683492305E-01):e := 1.17478177759113E+00+I*(8.47501236478051E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.00821098393516E-01+I*(5.76281057195847E-02):b := 2.21647474916549E-02+I*(5.05115108042199E-01):c := 3.53896233077705E-01+I*(-3.70115048062132E-01):d := 4.30373555895445E-01+I*(3.18471751842455E-01):e := 6.16623243580948E-01+I*(6.27158464228612E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.89530712863741E-01+I*(8.53919218715028E-03):b := -2.74271120075430E-01+I*(3.12711622713745E-01):c := 4.18706876737013E-01+I*(-7.70892177186559E-02):d := 3.53077031777297E-01+I*(3.11883126769630E-01):e := 5.00296489233145E-01+I*(3.91190074908017E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.79141363312056E-01+I*(-2.14644060221957E-01):b := -3.77679592736712E-01+I*(-2.52233007976435E-02):c := 2.80001337104293E-01+I*(1.89041070026301E-01):d := 2.98099545565860E-01+I*(2.57150699169815E-01):e := 4.83250113831153E-01+I*(2.31781197790315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.80932119106045E-01+I*(-5.07491727299957E-01):b := -2.39674696876819E-01+I*(-3.50566156052661E-01):c := 2.68147771405792E-03+I*(3.03750495828183E-01):d := 2.91165674066165E-01+I*(1.79884380200141E-01):e := 5.00327580190550E-01+I*(1.03919744918009E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.94065065707667E-01+I*(-7.32977130981766E-01):b := 7.51695429778316E-02+I*(-5.11085405294408E-01):c := -2.83491657158076E-01+I*(2.13365244501026E-01):d := 3.35519852814316E-01+I*(1.16237939226002E-01):e := 5.45089123173220E-01+I*(-1.94913503281767E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.05977374197988E-01+I*(-7.85593144893544E-01):b := 4.19534007895286E-01+I*(-4.31672307829933E-01):c := -4.44614477245312E-01+I*(-3.98224203390162E-02):d := 4.10408268632267E-01+I*(9.59922533305955E-02):e := 6.40385108393016E-01+I*(-1.59733965323937E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.84406143544517E-02+I*(-8.92382152980154E-01):b := 5.18249822153996E-01+I*(-1.75577013373298E-01):c := -6.09872188484673E-01+I*(-3.08820031582210E-01):d := 5.74350148979542E-01+I*(4.20833987701609E-01):e := 4.88026799188628E-01+I*(-3.63933063165547E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.34019467173946E-02+I*(-6.17807835765911E-01):b := 4.99841449866431E-01+I*(1.77345721196905E-01):c := -3.88509697271847E-01+I*(-5.11460610598530E-01):d := 6.07292494349538E-01+I*(4.91069053748574E-01):e := 6.95902254788486E-01+I*(-4.92598941266554E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.50750943439695E-02+I*(-3.42008569445025E-01):b := 2.58885457610258E-01+I*(4.35867547243817E-01):c := -8.86813375518921E-02+I*(-5.24403233503444E-01):d := 5.87381564743025E-01+I*(5.66047167243794E-01):e := 1.07588935490039E+00+I*(-2.61684082311515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27793235575531E-01+I*(-1.94033895896457E-01):b := -9.18721679102966E-02+I*(4.79023229210033E-01):c := 1.49319868941182E-01+I*(-3.41591903198512E-01):d := 5.23933905408223E-01+I*(6.10685235593944E-01):e := 8.70787310784864E-01+I*(1.51082499330185E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.16502850045755E-01+I*(-2.43122809428891E-01):b := -3.88308035477381E-01+I*(2.86619743881579E-01):c := 2.14130512600490E-01+I*(-4.85660728550361E-02):d := 4.46637381290076E-01+I*(6.04096610521119E-01):e := 6.10535871689994E-01+I*(1.38156067863158E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.06113500494070E-01+I*(-4.66306061837999E-01):b := -4.91716508138663E-01+I*(-5.13151796298098E-02):c := 7.54249729677702E-02+I*(2.17564214889921E-01):d := 3.91659895078639E-01+I*(5.49364182921305E-01):e := 4.95546237480372E-01+I*(4.69677151429463E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.07904256288060E-01+I*(-7.59153728915998E-01):b := -3.53711612278771E-01+I*(-3.76658034884827E-01):c := -2.01894886422466E-01+I*(3.32273640691803E-01):d := 3.84726023578943E-01+I*(4.72097863951631E-01):e := 4.43406199658922E-01+I*(-4.35444240369489E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.21037202889681E-01+I*(-9.84639132597807E-01):b := -3.88673724241202E-02+I*(-5.37177284126575E-01):c := -4.88068021294599E-01+I*(2.41888389364646E-01):d := 4.29080202327095E-01+I*(4.08451422977491E-01):e := 4.22512160191141E-01+I*(-1.34196129482164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.32949511380002E-01+I*(-1.03725514650959E+00):b := 3.05497092493334E-01+I*(-4.57764186662100E-01):c := -6.49190841381835E-01+I*(-1.12992754753965E-02):d := 5.03968618145045E-01+I*(3.88205737082085E-01):e := 4.29294116579154E-01+I*(-2.36288436825610E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.39267190617826E-01+I*(-1.03822502548103E+00):b := 4.47664013226661E-01+I*(-2.68866068430459E-01):c := -7.84921099532570E-01+I*(-4.18469187060836E-01):d := 4.58190328081279E-01+I*(7.04821936558631E-01):e := 2.83335382397794E-01+I*(-4.04069368314220E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.41109751689672E-01+I*(-7.63650708266789E-01):b := 4.29255640939096E-01+I*(8.40566661397429E-02):c := -5.63558608319745E-01+I*(-6.21109766077155E-01):d := 4.91132673451275E-01+I*(7.75057002605597E-01):e := 3.23937854518738E-01+I*(-5.45928153537691E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42632710628309E-01+I*(-4.87851441945904E-01):b := 1.88299648682923E-01+I*(3.42578492186656E-01):c := -2.63730248599790E-01+I*(-6.34052388982070E-01):d := 4.71221743844762E-01+I*(8.50035116100817E-01):e := 5.49641684653496E-01+I*(-6.75985358073267E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10085430603252E-01+I*(-3.39876768397335E-01):b := -1.62457976837632E-01+I*(3.85734174152872E-01):c := -2.57290421067161E-02+I*(-4.51241058677138E-01):d := 4.07774084509960E-01+I*(8.94673184450967E-01):e := 8.30058277582896E-01+I*(-4.17615053583819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.98795045073477E-01+I*(-3.88965681929770E-01):b := -4.58893844404717E-01+I*(1.93330688824417E-01):c := 3.90816015525921E-02+I*(-1.58215228333662E-01):d := 3.30477560391812E-01+I*(8.88084559378142E-01):e := 6.75832939844816E-01+I*(-1.56140635207213E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.88405695521792E-01+I*(-6.12148934338877E-01):b := -5.62302317065998E-01+I*(-1.44604234686971E-01):c := -9.96239380801273E-02+I*(1.07915059411295E-01):d := 2.75500074180375E-01+I*(8.33352131778327E-01):e := 5.06253611291586E-01+I*(-1.33666617560205E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.90196451315781E-01+I*(-9.04996601416876E-01):b := -4.24297421206106E-01+I*(-4.69947089941989E-01):c := -3.76943797470363E-01+I*(2.22624485213177E-01):d := 2.68566202680680E-01+I*(7.56085812808654E-01):e := 4.05415171653665E-01+I*(-1.74708648029847E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.03329397917403E-01+I*(-1.13048200509868E+00):b := -1.09453181351455E-01+I*(-6.30466339183736E-01):c := -6.63116932342496E-01+I*(1.32239233886021E-01):d := 3.12920381428832E-01+I*(6.92439371834513E-01):e := 3.42132375873857E-01+I*(-2.33053542568250E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15241706407724E-01+I*(-1.18309801901046E+00):b := 2.34911283566000E-01+I*(-5.51053241719261E-01):c := -8.24239752429732E-01+I*(-1.20948430954022E-01):d := 3.87808797246782E-01+I*(6.72193685939107E-01):e := 3.00960031908936E-01+I*(-3.05892206170364E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.99787036245128E-01+I*(-1.01000726796061E+00):b := 4.53557195244927E-01+I*(-3.85701314059010E-01):c := -8.48535226560587E-01+I*(-6.14984584418635E-01):d := 1.86662807942880E-01+I*(8.47703233076499E-01):e := 1.30029446857345E-01+I*(-4.42782886167669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.01629597316975E-01+I*(-7.35432950746363E-01):b := 4.35148822957361E-01+I*(-3.27785794888082E-02):c := -6.27172735347762E-01+I*(-8.17625163434955E-01):d := 2.19605153312877E-01+I*(9.17938299123465E-01):e := 7.81468080460295E-02+I*(-5.52383031130089E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.03152556255611E-01+I*(-4.59633684425477E-01):b := 1.94192830701189E-01+I*(2.25743246558105E-01):c := -3.27344375627806E-01+I*(-8.30567786339869E-01):d := 1.99694223706363E-01+I*(9.92916412618685E-01):e := 9.80633428593742E-02+I*(-7.50179256215236E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.50434415024050E-01+I*(-3.11659010876909E-01):b := -1.56564794819366E-01+I*(2.68898928524320E-01):c := -8.93431691347330E-02+I*(-6.47756456034937E-01):d := 1.36246564371562E-01+I*(1.03755448096884E+00):e := 4.15361884634829E-01+I*(-9.18704783028827E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.38275199446175E-01+I*(-3.60747924409343E-01):b := -4.53000662386451E-01+I*(7.64954431958658E-02):c := -2.45325254754248E-02+I*(-3.54730625691461E-01):d := 5.89500402534138E-02+I*(1.03096585589601E+00):e := 6.65466616784687E-01+I*(-5.81647351063549E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27885849894490E-01+I*(-5.83931176818450E-01):b := -5.56409135047733E-01+I*(-2.61439480315522E-01):c := -1.63238065108144E-01+I*(-8.86003379465038E-02):d := 3.97255404197673E-03+I*(9.76233428296195E-01):e := 5.18001617168112E-01+I*(-3.63389013695454E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.29676605688479E-01+I*(-8.76778843896450E-01):b := -4.18404239187840E-01+I*(-5.86782335570540E-01):c := -4.40557924498380E-01+I*(2.61090878553780E-02):d := -2.96131745771881E-03+I*(8.98967109326521E-01):e := 3.75627371057596E-01+I*(-3.23749550032548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.42809552290101E-01+I*(-1.10226424757826E+00):b := -1.03559999333190E-01+I*(-7.47301584812288E-01):c := -7.26731059370513E-01+I*(-6.42761634717779E-02):d := 4.13928612904334E-02+I*(8.35320668352381E-01):e := 2.74846311449213E-01+I*(-3.38876444738102E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.45278139219578E-01+I*(-1.15488026149004E+00):b := 2.40804465584265E-01+I*(-6.67888487347812E-01):c := -8.87853879457749E-01+I*(-3.17463828311821E-01):d := 1.16281277108384E-01+I*(8.15074982456975E-01):e := 1.96606583074981E-01+I*(-3.78319508451255E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.03175998967232E-01+I*(-7.68434461624157E-01):b := 6.11026697849925E-01+I*(-7.20569186699627E-01):c := -4.78299205052804E-01+I*(-4.45346615516935E-01):d := -2.29425057757305E-01+I*(5.83433998201421E-01):e := -2.83053769754878E-01+I*(-5.07189987015087E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.05018560039078E-01+I*(-4.93860144409914E-01):b := 5.92618325562359E-01+I*(-3.67646452129425E-01):c := -2.56936713839979E-01+I*(-6.47987194533255E-01):d := -1.96482712387309E-01+I*(6.53669064248386E-01):e := -4.16986648011277E-01+I*(-4.17186309647528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.06541518977714E-01+I*(-2.18060878089028E-01):b := 3.51662333306187E-01+I*(-1.09124626082512E-01):c := 4.28916458799762E-02+I*(-6.60929817438169E-01):d := -2.16393641993823E-01+I*(7.28647177743607E-01):e := -5.87974090964574E-01+I*(-3.38028936175982E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.53823377746154E-01+I*(-7.00862045404594E-02):b := 9.04707785632254E-04+I*(-6.59689441162962E-02):c := 2.80892852373050E-01+I*(-4.78118487133238E-01):d := -2.79841301328624E-01+I*(7.73285246093757E-01):e := -8.73860039760378E-01+I*(-2.75353238726819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.51137632759285E-02+I*(-1.19175118072894E-01):b := -2.95531159781453E-01+I*(-2.58372429444751E-01):c := 3.45703496032358E-01+I*(-1.85092656789761E-01):d := -3.57137825446772E-01+I*(7.66696621020932E-01):e := -1.54942449444736E+00+I*(-4.37734597979224E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.24496887172387E-01+I*(-3.42358370482002E-01):b := -3.98939632442735E-01+I*(-5.96307352956139E-01):c := 2.06997956399639E-01+I*(8.10376309551959E-02):d := -4.12115311658209E-01+I*(7.11964193421117E-01):e := -1.15911451262912E+00+I*(-2.46897023260316E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.26287642966376E-01+I*(-6.35206037560001E-01):b := -2.60934736582842E-01+I*(-9.21650208211156E-01):c := -7.03219029905970E-02+I*(1.95747056757077E-01):d := -4.19049183157904E-01+I*(6.34697874451443E-01):e := 1.40413095096488E-01+I*(-1.33512273747532E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.05794104320023E-02+I*(-8.60691441241810E-01):b := 5.39095032718086E-02+I*(-1.08216945745290E+00):c := -3.56495037862731E-01+I*(1.05361805429921E-01):d := -3.74695004409752E-01+I*(5.71051433477303E-01):e := -4.07000078324473E-03+I*(-8.30348830981435E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.48667101941682E-01+I*(-9.13307455153589E-01):b := 3.98273968189263E-01+I*(-1.00275635998843E+00):c := -5.17617857949967E-01+I*(-1.47825859410122E-01):d := -2.99806588591802E-01+I*(5.50805747581897E-01):e := -1.53226581898952E-01+I*(-6.26790951839817E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.20625729027748E-01+I*(-5.06972535665577E-01):b := 7.27110293888140E-01+I*(-7.35053762848793E-01):c := -2.95815795380856E-01+I*(-5.42118841649904E-01):d := -4.17285925386991E-01+I*(3.40842667975963E-01):e := -4.67659143842112E-01+I*(-3.57832084808643E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.22468290099595E-01+I*(-2.32398218451334E-01):b := 7.08701921600574E-01+I*(-3.82131028278591E-01):c := -7.44533041680306E-02+I*(-7.44759420666224E-01):d := -3.84343580016995E-01+I*(4.11077734022928E-01):e := -4.95507369137457E-01+I*(-2.11072852071128E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.23991249038231E-01+I*(4.34010478695521E-02):b := 4.67745929344402E-01+I*(-1.23609202231678E-01):c := 2.25375055551924E-01+I*(-7.57702043571138E-01):d := -4.04254509623508E-01+I*(4.86055847518149E-01):e := -5.47417759495720E-01+I*(-8.06584157554259E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.71273107806670E-01+I*(1.91375721418121E-01):b := 1.16988303823847E-01+I*(-8.04535202654620E-02):c := 4.63376262044998E-01+I*(-5.74890713266206E-01):d := -4.67702168958310E-01+I*(5.30693915868299E-01):e := -6.39414915533757E-01+I*(5.91410179661214E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.25634933364450E-02+I*(1.42286807885686E-01):b := -1.79447563743238E-01+I*(-2.72857005593917E-01):c := 5.28186905704306E-01+I*(-2.81864882922730E-01):d := -5.44998693076458E-01+I*(5.24105290795474E-01):e := -8.40301425220969E-01+I*(2.29607800390904E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.07047157111870E-01+I*(-8.08964445234213E-02):b := -2.82856036404520E-01+I*(-6.10791929105305E-01):c := 3.89481366071587E-01+I*(-1.57345951777729E-02):d := -5.99976179287895E-01+I*(4.69372863195659E-01):e := -1.43936628492840E+00+I*(3.01855867511801E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08837912905860E-01+I*(-3.73744111601421E-01):b := -1.44851140544628E-01+I*(-9.36134784360322E-01):c := 1.12161506681351E-01+I*(9.89748306241089E-02):d := -6.06910050787590E-01+I*(3.92106544225985E-01):e := -1.66720016900685E+00+I*(-1.04009902413444E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.80291404925188E-02+I*(-5.99229515283230E-01):b := 1.69993099310023E-01+I*(-1.09665403360207E+00):c := -1.74011628190783E-01+I*(8.58957929695229E-03):d := -5.62555872039438E-01+I*(3.28460103251845E-01):e := -6.42159820476014E-01+I*(-9.12769573615764E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.66116832002198E-01+I*(-6.51845529195008E-01):b := 5.14357564227478E-01+I*(-1.01724093613759E+00):c := -3.35134448278018E-01+I*(-2.44598085543091E-01):d := -4.87667456221488E-01+I*(3.08214417356439E-01):e := -4.77127075158261E-01+I*(-5.62102733815627E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.65928511363578E-01+I*(-2.95464609922546E-01):b := 8.25345993650727E-01+I*(-6.71532494697574E-01):c := -9.38214055201998E-02+I*(-4.98952593016837E-01):d := -4.05260997827922E-01+I*(3.42522894505847E-02):e := -6.58711494101034E-01+I*(-1.57423051516694E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.67771072435425E-01+I*(-2.08902927083031E-02):b := 8.06937621363162E-01+I*(-3.18609760127371E-01):c := 1.27541085692625E-01+I*(-7.01593172033157E-01):d := -3.72318652457926E-01+I*(1.04487355497550E-01):e := -5.56663438725529E-01+I*(-1.20541722936492E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.69294031374060E-01+I*(2.54908973612583E-01):b := 5.65981629106989E-01+I*(-6.00879340804580E-02):c := 4.27369445412581E-01+I*(-7.14535794938071E-01):d := -3.92229582064439E-01+I*(1.79465468992771E-01):e := -5.07151491241363E-01+I*(1.15018745209838E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.16575890142500E-01+I*(4.02883647161151E-01):b := 2.15224003586434E-01+I*(-1.69322521142426E-02):c := 6.65370651905654E-01+I*(-5.31724464633139E-01):d := -4.55677241399240E-01+I*(2.24103537342921E-01):e := -4.85240866333118E-01+I*(2.46516064611757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.21337243277250E-02+I*(3.53794733628717E-01):b := -8.12118639806507E-02+I*(-2.09335737442697E-01):c := 7.30181295564962E-01+I*(-2.38698634289663E-01):d := -5.32973765517388E-01+I*(2.17514912270095E-01):e := -4.95708342308675E-01+I*(4.11306385834128E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.61744374776040E-01+I*(1.30611481219609E-01):b := -1.84620336641933E-01+I*(-5.47270660954086E-01):c := 5.91475755932242E-01+I*(2.74316534552941E-02):d := -5.87951251728825E-01+I*(1.62782484670281E-01):e := -6.00891352864482E-01+I*(6.61100966966872E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.63535130570029E-01+I*(-1.62236185858390E-01):b := -4.66154407820401E-02+I*(-8.72613516209103E-01):c := 3.14155896542007E-01+I*(1.42141079257176E-01):d := -5.94885123228521E-01+I*(8.55161657006073E-02):e := -1.16555104395201E+00+I*(9.41570858930898E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.66680771716510E-02+I*(-3.87721589540199E-01):b := 2.68228799072610E-01+I*(-1.03313276545085E+00):c := 2.79827616698737E-02+I*(5.17558279300193E-02):d := -5.50530944480370E-01+I*(2.18697247264673E-02):e := -1.64962919188233E+00+I*(-1.20614717058590E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.11419614338028E-01+I*(-4.40337603451977E-01):b := 6.12593263990065E-01+I*(-9.53719667986375E-01):c := -1.33140058417362E-01+I*(-2.01431836910024E-01):d := -4.75642528662419E-01+I*(1.62403883106100E-03):e := -9.18598170361799E-01+I*(-3.28627138257869E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.11468893387853E-01+I*(-2.32877593498986E-01):b := 8.59768221450582E-01+I*(-5.59727689574183E-01):c := 3.31685445957800E-02+I*(-3.36045837092562E-01):d := -1.98976872327170E-01+I*(-1.92880091890177E-01):e := -8.96933942200827E-01+I*(2.03516315973778E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13311454459700E-01+I*(4.16967237152569E-02):b := 8.41359849163016E-01+I*(-2.06804955003981E-01):c := 2.54531035808605E-01+I*(-5.38686416108882E-01):d := -1.66034526957174E-01+I*(-1.22645025843212E-01):e := -6.13897397642201E-01+I*(2.35611160463888E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.14834413398335E-01+I*(3.17495990036143E-01):b := 6.00403856906843E-01+I*(5.17168710429322E-02):c := 5.54359395528561E-01+I*(-5.51629039013796E-01):d := -1.85945456563687E-01+I*(-4.76669123479915E-02):e := -4.59003876744295E-01+I*(3.08880137044930E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78837278332257E-02+I*(4.65470663584712E-01):b := 2.49646231386288E-01+I*(9.48725530091477E-02):c := 7.92360602021634E-01+I*(-3.68817708708864E-01):d := -2.49393115898488E-01+I*(-3.02884399784143E-03):e := -3.50795226228649E-01+I*(3.93506488105296E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.26593342303450E-01+I*(4.16381750052277E-01):b := -4.67896361807963E-02+I*(-9.75309323193069E-02):c := 8.57171245680942E-01+I*(-7.57918783653876E-02):d := -3.26689640016636E-01+I*(-9.61746907066675E-03):e := -2.59849215462758E-01+I*(4.99757527200465E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.16203992751766E-01+I*(1.93198497643169E-01):b := -1.50198108842078E-01+I*(-4.35465855830695E-01):c := 7.18465706048222E-01+I*(1.90338409379570E-01):d := -3.81667126228073E-01+I*(-6.43498966704811E-02):e := -1.76524583040402E-01+I*(6.61017675372207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.17994748545755E-01+I*(-9.96491694348301E-02):b := -1.21932129821857E-02+I*(-7.60808711085712E-01):c := 4.41145846657987E-01+I*(3.05047835181451E-01):d := -3.88600997727769E-01+I*(-1.41616215640155E-01):e := -1.39623750326466E-01+I*(9.76862240718132E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.31127695147376E-01+I*(-3.25134573116639E-01):b := 3.02651026872465E-01+I*(-9.21327960327460E-01):c := 1.54972711785854E-01+I*(2.14662583854295E-01):d := -3.44246818979617E-01+I*(-2.05262656614295E-01):e := -6.62572067776324E-01+I*(1.57393204408508E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.30400036376970E-02+I*(-3.77750587028417E-01):b := 6.47015491789919E-01+I*(-8.41914862862985E-01):c := -6.15010830138198E-03+I*(-3.85250809857483E-02):d := -2.69358403161667E-01+I*(-2.25508342509701E-01):e := -1.45799848628172E+00+I*(5.90135576681910E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.36886416449416E-02+I*(-3.48496646956688E-01):b := 8.14270434339702E-01+I*(-4.51954058367856E-01):c := 2.57340459717293E-02+I*(-1.29624455480967E-01):d := 1.05043816200780E-01+I*(-2.34276710521742E-01):e := -1.11287112809028E+00+I*(1.25031551856304E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.81539194269047E-02+I*(-7.39223297424451E-02):b := 7.95862062052136E-01+I*(-9.90313237976536E-02):c := 2.47096537184555E-01+I*(-3.32265034497287E-01):d := 1.37986161570776E-01+I*(-1.64041644474776E-01):e := -6.66126342928240E-01+I*(6.60755463920231E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.03231216344593E-02+I*(2.01876936578441E-01):b := 5.54906069795964E-01+I*(1.59490502249259E-01):c := 5.46924896904510E-01+I*(-3.45207657402201E-01):d := 1.18075231964262E-01+I*(-8.90635309795562E-02):e := -3.84514128384723E-01+I*(5.58433303439019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.73041262866020E-01+I*(3.49851610127010E-01):b := 2.04148444275409E-01+I*(2.02646184215475E-01):c := 7.84926103397583E-01+I*(-1.62396327097270E-01):d := 5.46275726294609E-02+I*(-4.44254626294062E-02):e := -2.00475536962168E-01+I*(5.42584907727153E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.61750877336245E-01+I*(3.00762696594575E-01):b := -9.22874232916758E-02+I*(1.02426988870204E-02):c := 8.49736747056892E-01+I*(1.30629503246207E-01):d := -2.26689514886870E-02+I*(-5.10140877022315E-02):e := -4.87788217165040E-02+I*(5.57274114880317E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.51361527784560E-01+I*(7.75794441854673E-02):b := -1.95695895952958E-01+I*(-3.27692224624368E-01):c := 7.11031207424172E-01+I*(3.96759790991164E-01):d := -7.76464377001240E-02+I*(-1.05746515302046E-01):e := 1.05968595574289E-01+I*(5.99395258085648E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.53152283578550E-01+I*(-2.15268222892532E-01):b := -5.76910000930649E-02+I*(-6.53035079879385E-01):c := 4.33711348033936E-01+I*(5.11469216793046E-01):d := -8.45803091998192E-02+I*(-1.83012834271720E-01):e := 3.00167455559071E-01+I*(6.98172691018011E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.66285230180171E-01+I*(-4.40753626574341E-01):b := 2.57153239761586E-01+I*(-8.13554329121133E-01):c := 1.47538213161803E-01+I*(4.21083965465889E-01):d := -4.02261304516676E-02+I*(-2.46659275245860E-01):e := 5.84642859007513E-01+I*(9.99685213742469E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.78197538670492E-01+I*(-4.93369640486119E-01):b := 6.01517704679040E-01+I*(-7.34141231656658E-01):c := -1.35846069254328E-02+I*(1.67896300625846E-01):d := 3.46622853662827E-02+I*(-2.66904961141266E-01):e := 3.63937586543557E-01+I*(2.19076276651334E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.29511269608074E-01+I*(-5.88222330220146E-01):b := 7.10141552558849E-01+I*(-3.98640080890524E-01):c := -1.12646216860910E-01+I*(2.37246932437652E-02):d := 3.64546408780109E-01+I*(-7.05676285142312E-02):e := 2.68280421556914E+00+I*(1.96060971078573E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.76687085362275E-02+I*(-3.13648013005903E-01):b := 6.91733180271283E-01+I*(-4.57173463203218E-02):c := 1.08716274351915E-01+I*(-1.78915885772555E-01):d := 3.97488754150106E-01+I*(-3.32562467265825E-04):e := -4.73996680450057E-01+I*(1.96055164437719E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.26145749597591E-01+I*(-3.78487466850166E-02):b := 4.50777188015111E-01+I*(2.12804479726591E-01):c := 4.08544634071870E-01+I*(-1.91858508677469E-01):d := 3.77577824543592E-01+I*(7.46455510279546E-02):e := -2.10226250001343E-01+I*(1.01336971629692E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78863890829152E-01+I*(1.10125926863552E-01):b := 1.00019562494556E-01+I*(2.55960161692807E-01):c := 6.46545840564944E-01+I*(-9.04717837253717E-03):d := 3.14130165208791E-01+I*(1.19283619378105E-01):e := 2.23827504277532E-02+I*(7.38443721244631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.67573505299377E-01+I*(6.10370133311175E-02):b := -1.96416305072529E-01+I*(6.35566763643523E-02):c := 7.11356484224252E-01+I*(2.83978651970939E-01):d := 2.36833641090643E-01+I*(1.12694994305279E-01):e := 1.92104490124765E-01+I*(5.99797952463427E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.57184155747692E-01+I*(-1.62146239077990E-01):b := -2.99824777733811E-01+I*(-2.74378247147036E-01):c := 5.72650944591532E-01+I*(5.50108939715896E-01):d := 1.81856154879206E-01+I*(5.79625667054646E-02):e := 3.45867056879855E-01+I*(5.03791155224140E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.58974911541682E-01+I*(-4.54993906155989E-01):b := -1.61819881873918E-01+I*(-5.99721102402053E-01):c := 2.95331085201297E-01+I*(6.64818365517778E-01):d := 1.74922283379510E-01+I*(-1.93037522642092E-02):e := 5.20299496306201E-01+I*(4.21732048256889E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.72107858143303E-01+I*(-6.80479309837798E-01):b := 1.53024357980732E-01+I*(-7.60240351643801E-01):c := 9.15795032916359E-03+I*(5.74433114190622E-01):d := 2.19276462127662E-01+I*(-8.29501932383492E-02):e := 7.76844323611569E-01+I*(3.44125695212275E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.84020166633624E-01+I*(-7.33095323749577E-01):b := 4.97388822898187E-01+I*(-6.80827254179326E-01):c := -1.51964869758072E-01+I*(3.21245449350579E-01):d := 2.94164877945613E-01+I*(-1.03195879133755E-01):e := 1.32079944277283E+00+I*(3.24686859654276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.64834067900882E-02+I*(-8.39884331836187E-01):b := 5.96104637156897E-01+I*(-4.24731959722690E-01):c := -3.17222580997433E-01+I*(5.22478381073847E-02):d := 4.58106758292888E-01+I*(2.21645855237259E-01):e := 1.10424755972686E+00+I*(-8.66111398626367E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.53591542817580E-02+I*(-5.65310014621944E-01):b := 5.77696264869332E-01+I*(-7.18092251524882E-02):c := -9.58600897846081E-02+I*(-1.50392740908935E-01):d := 4.91049103662884E-01+I*(2.91880921284224E-01):e := 3.42044507458769E+00+I*(-2.30254978224635E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.31178867796059E-02+I*(-2.89510748301058E-01):b := 3.36740272613159E-01+I*(1.86712600894425E-01):c := 2.03968269935347E-01+I*(-1.63335363813849E-01):d := 4.71138174056371E-01+I*(3.66859034779444E-01):e := 9.88576487722450E-01+I*(2.67658944914521E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.05836028011167E-01+I*(-1.41536074752489E-01):b := -1.40173529073958E-02+I*(2.29868282860640E-01):c := 4.41969476428420E-01+I*(1.94759664910826E-02):d := 4.07690514721569E-01+I*(4.11497103129594E-01):e := 5.35524502468242E-01+I*(1.09825211226396E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.94545642481392E-01+I*(-1.90624988284924E-01):b := -3.10453220474481E-01+I*(3.74647975321861E-02):c := 5.06780120087729E-01+I*(3.12501796834559E-01):d := 3.30393990603421E-01+I*(4.04908478056769E-01):e := 5.55460323461151E-01+I*(6.19725571000555E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.84156292929707E-01+I*(-4.13808240694032E-01):b := -4.13861693135763E-01+I*(-3.00470125979202E-01):c := 3.68074580455009E-01+I*(5.78632084579516E-01):d := 2.75416504391984E-01+I*(3.50176050456955E-01):e := 5.97237692178511E-01+I*(3.51348750931264E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.85947048723696E-01+I*(-7.06655907772031E-01):b := -2.75856797275870E-01+I*(-6.25812981234220E-01):c := 9.07547210647733E-02+I*(6.93341510381398E-01):d := 2.68482632892289E-01+I*(2.72909731487281E-01):e := 6.45935881683509E-01+I*(1.41131248781122E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.99079995325318E-01+I*(-9.32141311453840E-01):b := 3.89874425787806E-02+I*(-7.86332230475967E-01):c := -1.95418413807360E-01+I*(6.02956259054241E-01):d := 3.12836811640441E-01+I*(2.09263290513141E-01):e := 7.10236260618043E-01+I*(-7.16660837878766E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.10992303815639E-01+I*(-9.84757325365618E-01):b := 3.83351907496235E-01+I*(-7.06919133011493E-01):c := -3.56541233894596E-01+I*(3.49768594214199E-01):d := 3.87725227458391E-01+I*(1.89017604617735E-01):e := 8.19084483528998E-01+I*(-3.50776199343196E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61224398182190E-01+I*(-9.85727204337065E-01):b := 5.25518828229562E-01+I*(-5.18021014779852E-01):c := -4.92271492045331E-01+I*(-5.74013173712408E-02):d := 3.41946937394625E-01+I*(5.05633804094281E-01):e := 2.88153391553104E-01+I*(-7.90293970480997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.63066959254036E-01+I*(-7.11152887122822E-01):b := 5.07110455941997E-01+I*(-1.65098280209650E-01):c := -2.70909000832506E-01+I*(-2.60041896387560E-01):d := 3.74889282764621E-01+I*(5.75868870141246E-01):e := 7.20684943299820E-02+I*(-1.22646551092694E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64589918192672E-01+I*(-4.35353620801936E-01):b := 2.66154463685824E-01+I*(9.34235458372637E-02):c := 2.89193588874495E-02+I*(-2.72984519292475E-01):d := 3.54978353158107E-01+I*(6.50846983636467E-01):e := -2.61636703746279E-01+I*(-2.84664063312777E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.81282230388884E-02+I*(-2.87378947253368E-01):b := -8.46031618347309E-02+I*(1.36579227803479E-01):c := 2.66920565380523E-01+I*(-9.01731889875430E-02):d := 2.91530693823306E-01+I*(6.95485051986617E-01):e := 4.50564643777278E+00+I*(1.28450878226022E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76837837509113E-01+I*(-3.36467860785802E-01):b := -3.81039029401816E-01+I*(-5.58242575249754E-02):c := 3.31731209039831E-01+I*(2.02852641355933E-01):d := 2.14234169705158E-01+I*(6.88896426913792E-01):e := 1.38578241523475E+00+I*(4.65112885493669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.66448487957428E-01+I*(-5.59651113194910E-01):b := -4.84447502063098E-01+I*(-3.93759181036364E-01):c := 1.93025669407112E-01+I*(4.68982929100890E-01):d := 1.59256683493721E-01+I*(6.34163999313977E-01):e := 9.14760583444531E-01+I*(4.58487876430297E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.68239243751418E-01+I*(-8.52498780272909E-01):b := -3.46442606203205E-01+I*(-7.19102036291381E-01):c := -8.42941899831238E-02+I*(5.83692354902772E-01):d := 1.52322811994026E-01+I*(5.56897680344303E-01):e := 7.04750645518469E-01+I*(-1.88549955985787E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.81372190353040E-01+I*(-1.07798418395472E+00):b := -3.15983663485547E-02+I*(-8.79621285533129E-01):c := -3.70467324855257E-01+I*(4.93307103575616E-01):d := 1.96676990742177E-01+I*(4.93251239370163E-01):e := 5.61960622108177E-01+I*(-3.70495641844984E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.32844988433605E-02+I*(-1.13060019786650E+00):b := 3.12766098568900E-01+I*(-8.00208188068654E-01):c := -5.31590144942493E-01+I*(2.40119438735573E-01):d := 2.71565406560128E-01+I*(4.73005553474757E-01):e := 4.34061074641128E-01+I*(-5.53027961101475E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.21744243809492E-01+I*(-9.57509446816639E-01):b := 5.31412010247828E-01+I*(-6.34856260408403E-01):c := -5.55885619073347E-01+I*(-2.53916714729040E-01):d := 7.04194172562257E-02+I*(6.48515100612149E-01):e := -6.10710036743373E-02+I*(-6.44861421283312E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.23586804881339E-01+I*(-6.82935129602396E-01):b := 5.13003637960262E-01+I*(-2.81933525838201E-01):c := -3.34523127860522E-01+I*(-4.56557293745360E-01):d := 1.03361762626222E-01+I*(7.18750166659114E-01):e := -2.84624842521397E-01+I*(-6.94666732855626E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.25109763819975E-01+I*(-4.07135863281509E-01):b := 2.72047645704090E-01+I*(-2.34116997912876E-02):c := -3.46947681405671E-02+I*(-4.69499916650274E-01):d := 8.34508330197084E-02+I*(7.93728280154334E-01):e := -6.27163490201138E-01+I*(-8.24080313577782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.72391622588414E-01+I*(-2.59161189732941E-01):b := -7.87099798164651E-02+I*(1.97439821749278E-02):c := 2.03306438352506E-01+I*(-2.86688586345343E-01):d := 2.00031736849070E-02+I*(8.38366348504484E-01):e := -1.38185890019193E+00+I*(-1.43763532593235E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.16317991881811E-01+I*(-3.08250103265375E-01):b := -3.75145847383550E-01+I*(-1.72659503153527E-01):c := 2.68117082011814E-01+I*(6.33724399813372E-03):d := -5.72933504332410E-02+I*(8.31777723431659E-01):e := 1.91032844845089E+00+I*(-4.03696813118948E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.05928642330126E-01+I*(-5.31433355674483E-01):b := -4.78554320044832E-01+I*(-5.10594426664916E-01):c := 1.29411542379095E-01+I*(2.72467531743091E-01):d := -1.12270836644678E-01+I*(7.77045295831845E-01):e := 1.27225421726213E+00+I*(-8.64665654914252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.07719398124115E-01+I*(-8.24281022752482E-01):b := -3.40549424184939E-01+I*(-8.35937281919932E-01):c := -1.47908317011140E-01+I*(3.87176957544972E-01):d := -1.19204708144374E-01+I*(6.99778976862171E-01):e := 6.45711783357573E-01+I*(-6.48185852058991E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.20852344725737E-01+I*(-1.04976642643429E+00):b := -2.57051843302887E-02+I*(-9.96456531161680E-01):c := -4.34081451883274E-01+I*(2.96791706217816E-01):d := -7.48505293962219E-02+I*(6.36132535888031E-01):e := 3.42936497593802E-01+I*(-6.17384258683417E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.67235346783942E-01+I*(-1.10238244034607E+00):b := 3.18659280587166E-01+I*(-9.17043433697205E-01):c := -5.95204271970510E-01+I*(4.36040413777731E-02):d := 3.78864217285633E-05+I*(6.15886849992625E-01):e := 1.31522893299844E-01+I*(-6.21963654417321E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.86251246841441E-01+I*(-7.14104976495279E-01):b := 8.30820658658458E-01+I*(-8.61388838387884E-01):c := -4.86206552348640E-01+I*(1.93589613200126E-02):d := -1.90436997697440E-01+I*(3.56127224950525E-01):e := -7.09957831277722E-01+I*(-3.99553127394105E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.88093807913287E-01+I*(-4.39530659281035E-01):b := 8.12412286370892E-01+I*(-5.08466103817681E-01):c := -2.64844061135815E-01+I*(-1.83281617696307E-01):d := -1.57494652327443E-01+I*(4.26362290997490E-01):e := -6.70593419878010E-01+I*(-1.39682589408154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89616766851923E-01+I*(-1.63731392960149E-01):b := 5.71456294114719E-01+I*(-2.49944277770769E-01):c := 3.49842985841403E-02+I*(-1.96224240601222E-01):d := -1.77405581933957E-01+I*(5.01340404492711E-01):e := -6.54732733712715E-01+I*(7.22422381557692E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36898625620362E-01+I*(-1.57567194115807E-02):b := 2.20698668594165E-01+I*(-2.06788595804553E-01):c := 2.72985505077214E-01+I*(-1.34129102962898E-02):d := -2.40853241268758E-01+I*(5.45978472842861E-01):e := -6.53508335956100E-01+I*(2.94645249427823E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.81890111501372E-02+I*(-6.48456329440153E-02):b := -7.57371989729203E-02+I*(-3.99192081133008E-01):c := 3.37796148736522E-01+I*(2.79612920047187E-01):d := -3.18149765386906E-01+I*(5.39389847770036E-01):e := -6.77442501439695E-01+I*(5.99037689609819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41421639298178E-01+I*(-2.88028885353123E-01):b := -1.79145671634202E-01+I*(-7.37127004644396E-01):c := 1.99090609103802E-01+I*(5.45743207792144E-01):d := -3.73127251598343E-01+I*(4.84657420170221E-01):e := -8.15902962727763E-01+I*(1.20218649730597E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43212395092167E-01+I*(-5.80876552431122E-01):b := -4.11407757743098E-02+I*(-1.06246985989941E+00):c := -7.82292502864329E-02+I*(6.60452633594026E-01):d := -3.80061123098038E-01+I*(4.07391101200547E-01):e := -3.10990241871258E+00+I*(3.26837624219791E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.36546583062111E-02+I*(-8.06361956112931E-01):b := 2.73703464080341E-01+I*(-1.22298910914116E+00):c := -3.64402385158566E-01+I*(5.70067382266869E-01):d := -3.35706944349887E-01+I*(3.43744660226407E-01):e := -1.60156928357388E+00+I*(-2.05035415815937E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.31742349815890E-01+I*(-8.58977970024710E-01):b := 6.18067928997796E-01+I*(-1.14357601167669E+00):c := -5.25525205245802E-01+I*(3.16879717426826E-01):d := -2.60818528531937E-01+I*(3.23498974331001E-01):e := -8.27672327029853E-01+I*(-8.35069092214023E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.03700976901957E-01+I*(-4.52643050536698E-01):b := 9.46904254696672E-01+I*(-8.75873414537050E-01):c := -3.03723142676692E-01+I*(-7.74132648129563E-02):d := -3.78297865327125E-01+I*(1.13535894725067E-01):e := -6.28853698784657E-01+I*(-5.19932136583456E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.05543537973803E-01+I*(-1.78068733322455E-01):b := 9.28495882409106E-01+I*(-5.22950679966847E-01):c := -8.23606514638666E-02+I*(-2.80053843829276E-01):d := -3.45355519957129E-01+I*(1.83770960772033E-01):e := -5.11653090825039E-01+I*(4.58487213879062E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.07066496912439E-01+I*(9.77305329984312E-02):b := 6.87539890152934E-01+I*(-2.64428853919934E-01):c := 2.17467708256089E-01+I*(-2.92996466734190E-01):d := -3.65266449563643E-01+I*(2.58749074267253E-01):e := -4.50400397303276E-01+I*(1.42336945348254E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54348355680878E-01+I*(2.45705206547000E-01):b := 3.36782264632379E-01+I*(-2.21273171953719E-01):c := 4.55468914749162E-01+I*(-1.10185136429259E-01):d := -4.28714108898444E-01+I*(3.03387142617403E-01):e := -4.17682547062245E-01+I*(2.44978629065025E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.56387412106535E-02+I*(1.96616293014565E-01):b := 4.03463970652942E-02+I*(-4.13676657282174E-01):c := 5.20279558408470E-01+I*(1.82840693914218E-01):d := -5.06010633016592E-01+I*(2.96798517544578E-01):e := -4.12990017063459E-01+I*(3.71597822967558E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.23971909237662E-01+I*(-2.65669593945425E-02):b := -6.30620755959880E-02+I*(-7.51611580793562E-01):c := 3.81574018775751E-01+I*(4.48970981659175E-01):d := -5.60988119228029E-01+I*(2.42066089944763E-01):e := -4.74999887485522E-01+I*(5.51724799458064E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.25762665031651E-01+I*(-3.19414626472542E-01):b := 7.49428202639046E-02+I*(-1.07695443604858E+00):c := 1.04254159385515E-01+I*(5.63680407461057E-01):d := -5.67921990727724E-01+I*(1.64799770975090E-01):e := -7.90240671871850E-01+I*(7.53920801382428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.11043883667274E-02+I*(-5.44900030154351E-01):b := 3.89787060118555E-01+I*(-1.23747368529033E+00):c := -1.81918975486619E-01+I*(4.73295156133900E-01):d := -5.23567811979572E-01+I*(1.01153330000949E-01):e := -1.27495799828201E+00+I*(2.87930532896973E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.49192079876407E-01+I*(-5.97516044066130E-01):b := 7.34151525036010E-01+I*(-1.15806058782585E+00):c := -3.43041795573854E-01+I*(2.20107491293858E-01):d := -4.48679396161622E-01+I*(8.09076441055434E-02):e := -8.89461666086940E-01+I*(-1.06439252626679E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.49003759237787E-01+I*(-2.41135124793667E-01):b := 1.04513995445926E+00+I*(-8.12352146385830E-01):c := -1.01728752816036E-01+I*(-3.42470161798892E-02):d := -3.66272937768056E-01+I*(-1.93054483800311E-01):e := -5.39457306802472E-01+I*(1.80652329987093E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.50846320309633E-01+I*(3.34391924205757E-02):b := 1.02673158217169E+00+I*(-4.59429411815628E-01):c := 1.19633738396790E-01+I*(-2.36887595196209E-01):d := -3.33330592398060E-01+I*(-1.22819417753345E-01):e := -4.17814846786331E-01+I*(1.77845516910900E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52369279248269E-01+I*(3.09238458741462E-01):b := 7.85775589915521E-01+I*(-2.00907585768715E-01):c := 4.19462098116745E-01+I*(-2.49830218101123E-01):d := -3.53241522004573E-01+I*(-4.78413042581251E-02):e := -3.39929330461274E-01+I*(2.14137595550224E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.99651138016708E-01+I*(4.57213132290030E-01):b := 4.35017964394966E-01+I*(-1.57751903802499E-01):c := 6.57463304609818E-01+I*(-6.70188877961915E-02):d := -4.16689181339375E-01+I*(-3.20323590797484E-03):e := -2.87612285028362E-01+I*(2.66804065649407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.90584764535167E-02+I*(4.08124218757595E-01):b := 1.38582096827881E-01+I*(-3.50155389130954E-01):c := 7.22273948269126E-01+I*(2.26006942547285E-01):d := -4.93985705457523E-01+I*(-9.79186098080025E-03):e := -2.53897532848458E-01+I*(3.37121983640162E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.78669126901832E-01+I*(1.84940966348488E-01):b := 3.51736241665994E-02+I*(-6.88090312642343E-01):c := 5.83568408636407E-01+I*(4.92137230292242E-01):d := -5.48963191668960E-01+I*(-6.45242885806145E-02):e := -2.48423858605364E-01+I*(4.36871351549382E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.80459882695821E-01+I*(-1.07906700729511E-01):b := 1.73178520026492E-01+I*(-1.01343316789736E+00):c := 3.06248549246171E-01+I*(6.06846656094124E-01):d := -5.55897063168655E-01+I*(-1.41790607550289E-01):e := -3.25074445051274E-01+I*(5.72571786889987E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.35928292974423E-02+I*(-3.33392104411320E-01):b := 4.88022759881143E-01+I*(-1.17395241713911E+00):c := 2.00754143740374E-02+I*(5.16461404766967E-01):d := -5.11542884420503E-01+I*(-2.05437048524428E-01):e := -5.83004056754920E-01+I*(5.99520268247996E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.94494862212237E-01+I*(-3.86008118323099E-01):b := 8.32387224798598E-01+I*(-1.09453931967463E+00):c := -1.41047405713198E-01+I*(2.63273739926924E-01):d := -4.36654468602553E-01+I*(-2.25682734419835E-01):e := -6.87556081304285E-01+I*(3.19754007825752E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.94544141262062E-01+I*(-1.78548108370107E-01):b := 1.07956218225911E+00+I*(-7.00547341262440E-01):c := 2.52611972999442E-02+I*(1.28659739744386E-01):d := -1.59988812267304E-01+I*(-4.20186865141073E-01):e := -4.34566215146901E-01+I*(3.84394215139275E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.96386702333908E-01+I*(9.60262088441358E-02):b := 1.06115380997155E+00+I*(-3.47624606692238E-01):c := 2.46623688512770E-01+I*(-7.39808392719336E-02):d := -1.27046466897308E-01+I*(-3.49951799094108E-01):e := -3.42717831766241E-01+I*(3.00314833299088E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.97909661272544E-01+I*(3.71825475165022E-01):b := 8.20197817715375E-01+I*(-8.91027806453246E-02):c := 5.46452048232725E-01+I*(-8.69234621768479E-02):d := -1.46957396503821E-01+I*(-2.74973685598887E-01):e := -2.60433468546982E-01+I*(2.87560189700308E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.48084799590170E-02+I*(5.19800148713590E-01):b := 4.69440192194821E-01+I*(-4.59470986791092E-02):c := 7.84453254725798E-01+I*(9.58878681280839E-02):d := -2.10405055838623E-01+I*(-2.30335617248737E-01):e := -1.96467672408247E-01+I*(3.04949303135088E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.43518094429242E-01+I*(4.70711235181156E-01):b := 1.73004324627736E-01+I*(-2.38350584007564E-01):c := 8.49263898385106E-01+I*(3.88913698471560E-01):d := -2.87701579956771E-01+I*(-2.36924242321562E-01):e := -1.45085909967756E-01+I*(3.42297307764434E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.33128744877557E-01+I*(2.47527982772048E-01):b := 6.95958519664539E-02+I*(-5.76285507518952E-01):c := 7.10558358752387E-01+I*(6.55043986216517E-01):d := -3.42679066168208E-01+I*(-2.91656669921377E-01):e := -1.06228632917190E-01+I*(4.04338239772572E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.34919500671546E-01+I*(-4.53196843059510E-02):b := 2.07600747826346E-01+I*(-9.01628362773969E-01):c := 4.33238499362151E-01+I*(7.69753412018399E-01):d := -3.49612937667903E-01+I*(-3.68922988891051E-01):e := -9.92979683256437E-02+I*(5.05548911691662E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.48052447273167E-01+I*(-2.70805087987760E-01):b := 5.22444987680998E-01+I*(-1.06214761201572E+00):c := 1.47065364490018E-01+I*(6.79368160691242E-01):d := -3.05258758919752E-01+I*(-4.32569429865191E-01):e := -2.00270715442316E-01+I*(6.30284875209102E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.99647557634886E-02+I*(-3.23421101899538E-01):b := 8.66809452598452E-01+I*(-9.82734514551242E-01):c := -1.40574555972178E-02+I*(4.26180495851200E-01):d := -2.30370343101801E-01+I*(-4.52815115760597E-01):e := -4.15867548255200E-01+I*(5.78095253811349E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.06133937707330E-02+I*(-2.94167161827809E-01):b := 1.03406439514823E+00+I*(-5.92773710056113E-01):c := 1.78266986758934E-02+I*(3.35081121355980E-01):d := 1.44031876260645E-01+I*(-4.61583483772638E-01):e := -2.84068986693405E-01+I*(6.09682668300115E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.12291673011133E-02+I*(-1.95928446135663E-02):b := 1.01565602286067E+00+I*(-2.39850975485910E-01):c := 2.39189189888719E-01+I*(1.32440542339661E-01):d := 1.76974221630641E-01+I*(-3.91348417725672E-01):e := -2.66579120003594E-01+I*(4.46004709298248E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.72478737602507E-02+I*(2.56206421707320E-01):b := 7.74700030604496E-01+I*(1.86708505610026E-02):c := 5.39017549608674E-01+I*(1.19497919434746E-01):d := 1.57063292024128E-01+I*(-3.16370304230452E-01):e := -1.89987602394914E-01+I*(3.76745973039151E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.89966014991812E-01+I*(4.04181095255888E-01):b := 4.23942405083941E-01+I*(6.18265325272180E-02):c := 7.77018756101747E-01+I*(3.02309249739678E-01):d := 9.36156326893264E-02+I*(-2.71732235880302E-01):e := -1.17639681594130E-01+I*(3.57655468912043E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.78675629462036E-01+I*(3.55092181723454E-01):b := 1.27506537516856E-01+I*(-1.30576952801237E-01):c := 8.41829399761056E-01+I*(5.95335080083154E-01):d := 1.63191085711784E-02+I*(-2.78320860953127E-01):e := -5.26417048631499E-02+I*(3.65243278273071E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.68286279910351E-01+I*(1.31908929314346E-01):b := 2.40980648555745E-02+I*(-4.68511876312625E-01):c := 7.03123860128336E-01+I*(8.61465367828111E-01):d := -3.86583776402588E-02+I*(-3.33053288552941E-01):e := 8.71135725849962E-03+I*(3.96765977024938E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.70077035704341E-01+I*(-1.60938737763653E-01):b := 1.62102960715467E-01+I*(-7.93854731567642E-01):c := 4.25804000738101E-01+I*(9.76174793629994E-01):d := -4.55922491399542E-02+I*(-4.10319607522616E-01):e := 6.37094858863091E-02+I*(4.65153556103748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.83209982305962E-01+I*(-3.86424141445462E-01):b := 4.76947200570118E-01+I*(-9.54373980809389E-01):c := 1.39630865865967E-01+I*(8.85789542302836E-01):d := -1.23807039180212E-03+I*(-4.73966048496755E-01):e := 7.45176135971356E-02+I*(5.97967455139741E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.95122290796283E-01+I*(-4.39040155357240E-01):b := 8.21311665487572E-01+I*(-8.74960883344915E-01):c := -2.14919542212686E-02+I*(6.32601877462794E-01):d := 7.36503454261482E-02+I*(-4.94211734392162E-01):e := -8.54989256055300E-02+I*(7.33202296486362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.46436021733865E-01+I*(-5.33892845091267E-01):b := 9.29935513367381E-01+I*(-5.39459732578781E-01):c := -1.20553564156746E-01+I*(4.88430270080713E-01):d := 4.03534468839975E-01+I*(-2.97874401765127E-01):e := 1.05427344213138E-02+I*(9.26708733348089E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.45934606620190E-02+I*(-2.59318527877024E-01):b := 9.11527141079815E-01+I*(-1.86536998008578E-01):c := 1.00808927056079E-01+I*(2.85789691064393E-01):d := 4.36476814209971E-01+I*(-2.27639335718162E-01):e := -1.70702034278255E-01+I*(6.80076246458265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43070501723383E-01+I*(1.64807384438622E-02):b := 6.70571148823643E-01+I*(7.19848280383344E-02):c := 4.00637286776034E-01+I*(2.72847068159479E-01):d := 4.16565884603458E-01+I*(-1.52661222222941E-01):e := -1.18753043476866E-01+I*(5.13835728650943E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.95788642954944E-01+I*(1.64455411992431E-01):b := 3.19813523303088E-01+I*(1.15140510004550E-01):c := 6.38638493269108E-01+I*(4.55658398464411E-01):d := 3.53118225268656E-01+I*(-1.08023153872791E-01):e := -3.70636818323876E-02+I*(4.40470870095413E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.84498257425169E-01+I*(1.15366498459996E-01):b := 2.33776557360034E-02+I*(-7.72629753239048E-02):c := 7.03449136928416E-01+I*(7.48684228807887E-01):d := 2.75821701150508E-01+I*(-1.14611778945616E-01):e := 4.30616504930341E-02+I*(4.09812266498377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.74108907873483E-01+I*(-1.07816753949111E-01):b := -8.00308169252785E-02+I*(-4.15197898835293E-01):c := 5.64743597295696E-01+I*(1.01481451655284E+00):d := 2.20844214939071E-01+I*(-1.69344206545431E-01):e := 1.25351084260239E-01+I*(4.05612443759400E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.75899663667473E-01+I*(-4.00664421027111E-01):b := 5.79740789346141E-02+I*(-7.40540754090310E-01):c := 2.87423737905461E-01+I*(1.12952394235473E+00):d := 2.13910343439376E-01+I*(-2.46610525515105E-01):e := 2.18393636620867E-01+I*(4.32823901130137E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.89032610269094E-01+I*(-6.26149824708920E-01):b := 3.72818318789265E-01+I*(-9.01060003332057E-01):c := 1.25060303332720E-03+I*(1.03913869102757E+00):d := 2.58264522187528E-01+I*(-3.10256966489245E-01):e := 3.23439770742265E-01+I*(5.27235116164725E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.00944918759415E-01+I*(-6.78765838620698E-01):b := 7.17182783706719E-01+I*(-8.21646905867583E-01):c := -1.59872217053908E-01+I*(7.85951026187527E-01):d := 3.33152938005478E-01+I*(-3.30502652384651E-01):e := 3.46866025288457E-01+I*(7.72937047457514E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.34081589158799E-02+I*(-7.85554846707308E-01):b := 8.15898597965430E-01+I*(-5.65551611410947E-01):c := -3.25129928293270E-01+I*(5.16953414944333E-01):d := 4.97094818352754E-01+I*(-5.66091801363721E-03):e := 1.02483570176870E+00+I*(1.43372376581076E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.84344021559666E-02+I*(-5.10980529493065E-01):b := 7.97490225677864E-01+I*(-2.12628876840745E-01):c := -1.03767437080444E-01+I*(3.14312835928013E-01):d := 5.30037163722750E-01+I*(6.45741480333281E-02):e := -5.02309190949818E-02+I*(1.30364151552801E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.00426389053973E-02+I*(-2.35181263172179E-01):b := 5.56534233421691E-01+I*(4.58929492061682E-02):c := 1.96060922639511E-01+I*(3.01370213023099E-01):d := 5.10126234116236E-01+I*(1.39552261528548E-01):e := -7.16473647459764E-02+I*(8.06549844153201E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.22760780136958E-01+I*(-8.72065896236104E-02):b := 2.05776607901136E-01+I*(8.90486311723835E-02):c := 4.34062129132585E-01+I*(4.84181543328030E-01):d := 4.46678574781435E-01+I*(1.84190329878698E-01):e := 4.74753760192565E-02+I*(6.07158349099086E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.11470394607183E-01+I*(-1.36295503156045E-01):b := -9.06592596659483E-02+I*(-1.03354854156071E-01):c := 4.98872772791893E-01+I*(7.77207373671507E-01):d := 3.69382050663287E-01+I*(1.77601704805873E-01):e := 1.60811069641159E-01+I*(5.05593117231574E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.01081045055498E-01+I*(-3.59478755565153E-01):b := -1.94067732327230E-01+I*(-4.41289777667459E-01):c := 3.60167233159173E-01+I*(1.04333766141646E+00):d := 3.14404564451850E-01+I*(1.22869277206058E-01):e := 2.74300350133610E-01+I*(4.42142907689862E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.02871800849488E-01+I*(-6.52326422643151E-01):b := -5.60628364673376E-02+I*(-7.66632632922476E-01):c := 8.28473737689382E-02+I*(1.15804708721835E+00):d := 3.07470692952155E-01+I*(4.56029582363844E-02):e := 4.08353630817893E-01+I*(4.00926461079676E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.16004747451109E-01+I*(-8.77811826324961E-01):b := 2.58781403387313E-01+I*(-9.27151882164224E-01):c := -2.03325761103196E-01+I*(1.06766183589119E+00):d := 3.51824871700307E-01+I*(-1.80434827377555E-02):e := 6.02168391992756E-01+I*(3.93859123783324E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27917055941430E-01+I*(-9.30427840236740E-01):b := 6.03145868304768E-01+I*(-8.47738784699749E-01):c := -3.64448581190432E-01+I*(8.14474171051146E-01):d := 4.26713287518257E-01+I*(-3.82891686331612E-02):e := 9.39279301090757E-01+I*(5.38924324307879E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.44299646056398E-01+I*(-9.31397719208187E-01):b := 7.45312789038095E-01+I*(-6.58840666468108E-01):c := -5.00178839341167E-01+I*(4.07304259465707E-01):d := 3.80934997454490E-01+I*(2.78327030843385E-01):e := 2.27488994157721E+00+I*(-2.77701710890172E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.46142207128245E-01+I*(-6.56823401993943E-01):b := 7.26904416750529E-01+I*(-3.05917931897906E-01):c := -2.78816348128341E-01+I*(2.04663680449388E-01):d := 4.13877342824487E-01+I*(3.48562096890351E-01):e := -4.42303985653560E+00+I*(2.14760955662468E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.47665166066881E-01+I*(-3.81024135673057E-01):b := 4.85948424494356E-01+I*(-4.73961058509930E-02):c := 2.10120115916136E-02+I*(1.91721057544473E-01):d := 3.93966413217973E-01+I*(4.23540210385571E-01):e := -7.00836157808125E-01+I*(1.47528328301638E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05052975164680E-01+I*(-2.33049462124489E-01):b := 1.35190798973801E-01+I*(-4.24042388477774E-03):c := 2.59013218084687E-01+I*(3.74532387849405E-01):d := 3.30518753883172E-01+I*(4.68178278735721E-01):e := -2.75911972896018E-02+I*(1.04104698688527E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.93762589634905E-01+I*(-2.82138375656923E-01):b := -1.61245068593283E-01+I*(-1.96643909213232E-01):c := 3.23823861743995E-01+I*(6.67558218192881E-01):d := 2.53222229765024E-01+I*(4.61589653662896E-01):e := 2.92842868408617E-01+I*(7.84263738376589E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.83373240083220E-01+I*(-5.05321628066031E-01):b := -2.64653541254565E-01+I*(-5.34578832724621E-01):c := 1.85118322111276E-01+I*(9.33688505937838E-01):d := 1.98244743553587E-01+I*(4.06857226063081E-01):e := 5.20060715351871E-01+I*(5.78308316264558E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.85163995877209E-01+I*(-7.98169295144030E-01):b := -1.26648645394673E-01+I*(-8.59921687979638E-01):c := -9.22015372789592E-02+I*(1.04839793173972E+00):d := 1.91310872053891E-01+I*(3.29590907093407E-01):e := 7.31418581457239E-01+I*(3.65965140985782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.98296942478831E-01+I*(-1.02365469882584E+00):b := 1.88195594459978E-01+I*(-1.02044093722139E+00):c := -3.78374672151093E-01+I*(9.58012680412564E-01):d := 2.35665050802043E-01+I*(2.65944466119267E-01):e := 9.83696353385364E-01+I*(8.14794478983011E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10209250969152E-01+I*(-1.07627071273762E+00):b := 5.32560059377432E-01+I*(-9.41027839756910E-01):c := -5.39497492238329E-01+I*(7.04825015572521E-01):d := 3.10553466619994E-01+I*(2.45698780223861E-01):e := 1.38771206106665E+00+I*(-4.66226099791419E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.04819491683701E-01+I*(-9.03179961687760E-01):b := 7.51205971056360E-01+I*(-7.75675912096660E-01):c := -5.63792966369184E-01+I*(2.10788862107908E-01):d := 1.09407477316091E-01+I*(4.21208327361253E-01):e := -6.89743841934729E-01+I*(-1.16508897842025E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.06662052755547E-01+I*(-6.28605644473517E-01):b := 7.32797598768794E-01+I*(-4.22753177526458E-01):c := -3.42430475156358E-01+I*(8.14828309158795E-03):d := 1.42349822686087E-01+I*(4.91443393408218E-01):e := -1.13012293530564E+00+I*(-5.08785565684401E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.08185011694183E-01+I*(-3.52806378152631E-01):b := 4.91841606512622E-01+I*(-1.64231351479545E-01):c := -4.26021154364032E-02+I*(-4.79433981332648E-03):d := 1.22438893079574E-01+I*(5.66421506903439E-01):e := -1.19448583521141E+00+I*(1.94757511408065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55466870462622E-01+I*(-2.04831704604062E-01):b := 1.41083980992067E-01+I*(-1.21075669513329E-01):c := 1.95399091056670E-01+I*(1.78016990491605E-01):d := 5.89912337447726E-02+I*(6.11059575253589E-01):e := -9.24033801066626E-01+I*(8.62681940739760E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.33242744007602E-01+I*(-2.53920618136497E-01):b := -1.55351886575018E-01+I*(-3.13479154841784E-01):c := 2.60209734715978E-01+I*(4.71042820835082E-01):d := -1.83052903733753E-02+I*(6.04470950180763E-01):e := -2.66240812453968E-01+I*(1.37924324368907E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.22853394455918E-01+I*(-4.77103870545604E-01):b := -2.58760359236300E-01+I*(-6.51414078353172E-01):c := 1.21504195083259E-01+I*(7.37173108580039E-01):d := -7.32827765848122E-02+I*(5.49738522580949E-01):e := 8.04641877064780E-01+I*(1.40494972999596E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.24644150249907E-01+I*(-7.69951537623604E-01):b := -1.20755463376407E-01+I*(-9.76756933608189E-01):c := -1.55815664306976E-01+I*(8.51882534381920E-01):d := -8.02166480845076E-02+I*(4.72472203611275E-01):e := 1.75275833561343E+00+I*(4.11855965241022E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.37777096851529E-01+I*(-9.95436941305413E-01):b := 1.94088776478244E-01+I*(-1.13727618284994E+00):c := -4.41988799179110E-01+I*(7.61497283054764E-01):d := -3.58624693363558E-02+I*(4.08825762637135E-01):e := 1.41920819995387E+00+I*(-1.04511087226112E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.50310594658150E-01+I*(-1.04805295521719E+00):b := 5.38453241395698E-01+I*(-1.05786308538546E+00):c := -6.03111619266346E-01+I*(5.08309618214722E-01):d := 3.90259464815946E-02+I*(3.88580076741729E-01):e := 2.28000242458481E-01+I*(-1.53447368573596E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.19446731871229E-01+I*(-6.96708695161563E-01):b := 1.07503286434070E+00+I*(-4.21268580679191E-01):c := -7.70496173626329E-01+I*(-4.16008422133655E-02):d := -2.49729075010795E-01+I*(3.26361289641555E-01):e := -1.17454564795917E+00+I*(-1.22568741155765E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.21289292943075E-01+I*(-4.22134377947320E-01):b := 1.05662449205314E+00+I*(-6.83458461089887E-02):c := -5.49133682413504E-01+I*(-2.44241421229685E-01):d := -2.16786729640799E-01+I*(3.96596355688521E-01):e := -8.06006310203780E-01+I*(1.45167537789773E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.22812251881711E-01+I*(-1.46335111626434E-01):b := 8.15668499796963E-01+I*(1.90175979937924E-01):c := -2.49305322693549E-01+I*(-2.57184044134599E-01):d := -2.36697659247312E-01+I*(4.71574469183741E-01):e := -6.08652156425944E-01+I*(3.23276764186706E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.70094110650150E-01+I*(1.63956192213493E-03):b := 4.64910874276408E-01+I*(2.33331661904140E-01):c := -1.13041162004749E-02+I*(-7.43727138296675E-02):d := -3.00145318582113E-01+I*(5.16212537533891E-01):e := -4.59391316590725E-01+I*(4.78445564785684E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.81384496179926E-01+I*(-4.74493516102996E-02):b := 1.68475006709323E-01+I*(4.09281765756849E-02):c := 5.35065274588329E-02+I*(2.18653116513809E-01):d := -3.77441842700261E-01+I*(5.09623912461066E-01):e := -3.13745812122568E-01+I*(6.50918435764661E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.17738457316103E-02+I*(-2.70632604019407E-01):b := 6.50665340480413E-02+I*(-2.97006746935703E-01):c := -8.51990121738866E-02+I*(4.84783404258766E-01):d := -4.32419328911698E-01+I*(4.54891484861251E-01):e := -1.32555487857195E-01+I*(9.03369394879755E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.99830899376210E-02+I*(-5.63480271097407E-01):b := 2.03071429907934E-01+I*(-6.22349602190720E-01):c := -3.62518871564122E-01+I*(5.99492830060648E-01):d := -4.39353200411394E-01+I*(3.77625165891577E-01):e := 1.62125773825655E-01+I*(1.46415895923652E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.76850143335999E-01+I*(-7.88965674779215E-01):b := 5.17915669762585E-01+I*(-7.82868851432468E-01):c := -6.48692006436256E-01+I*(5.09107578733491E-01):d := -3.94999021663242E-01+I*(3.13978724917437E-01):e := -2.03601527466555E-01+I*(4.72539734891955E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.64937834845679E-01+I*(-8.41581688690994E-01):b := 8.62280134680040E-01+I*(-7.03455753967993E-01):c := -8.09814826523492E-01+I*(2.55919913893448E-01):d := -3.20110605845291E-01+I*(2.93733039022031E-01):e := -2.54440665484069E+00+I*(-6.16488793998326E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.36896461931745E-01+I*(-4.35246769202983E-01):b := 1.19111646037892E+00+I*(-4.35753156828357E-01):c := -5.88012763954381E-01+I*(-1.38373068346335E-01):d := -4.37589942640481E-01+I*(8.37699594160974E-02):e := -6.84596698094153E-01+I*(1.94229486593301E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.38739023003592E-01+I*(-1.60672451988739E-01):b := 1.17270808809135E+00+I*(-8.28304222581548E-02):c := -3.66650272741556E-01+I*(-3.41013647362654E-01):d := -4.04647597270485E-01+I*(1.54005025463063E-01):e := -5.03052462124470E-01+I*(2.02198383102066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.40261981942228E-01+I*(1.15126814332147E-01):b := 9.31752095835177E-01+I*(1.75691403788758E-01):c := -6.68219130216005E-02+I*(-3.53956270267568E-01):d := -4.24558526876998E-01+I*(2.28983138958283E-01):e := -3.94919587327114E-01+I*(2.54014803798288E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.87543840710667E-01+I*(2.63101487880715E-01):b := 5.80994470314622E-01+I*(2.18847085754974E-01):c := 1.71179293471473E-01+I*(-1.71144939962636E-01):d := -4.88006186211799E-01+I*(2.73621207308433E-01):e := -3.20729230619143E-01+I*(3.21777104909316E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.98834226240442E-01+I*(2.14012574348281E-01):b := 2.84558602747538E-01+I*(2.64436004265189E-02):c := 2.35989937130781E-01+I*(1.21880890380840E-01):d := -5.65302710329947E-01+I*(2.67032582235608E-01):e := -2.65354805159933E-01+I*(4.10515363638863E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09223575792127E-01+I*(-9.17067806082685E-03):b := 1.81150130086256E-01+I*(-3.11491323084869E-01):c := 9.72843974980614E-02+I*(3.88011178125797E-01):d := -6.20280196541384E-01+I*(2.12300154635793E-01):e := -2.33364249841759E-01+I*(5.42709192937849E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07432819998137E-01+I*(-3.02018345138826E-01):b := 3.19155025946148E-01+I*(-6.36834178339886E-01):c := -1.80035461892174E-01+I*(5.02720603927679E-01):d := -6.27214068041079E-01+I*(1.35033835666119E-01):e := -2.89423268660646E-01+I*(7.62647676608270E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.94299873396516E-01+I*(-5.27503748820635E-01):b := 6.33999265800799E-01+I*(-7.97353427581634E-01):c := -4.66208596764308E-01+I*(4.12335352600522E-01):d := -5.82859889292928E-01+I*(7.13873946919796E-02):e := -7.05656013883934E-01+I*(9.28592848956349E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.82387564906195E-01+I*(-5.80119762732414E-01):b := 9.78363730718254E-01+I*(-7.17940330117159E-01):c := -6.27331416851544E-01+I*(1.59147687760479E-01):d := -5.07971473474977E-01+I*(5.11417087965736E-02):e := -9.55916952545454E-01+I*(4.13983598499053E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.82199244267575E-01+I*(-2.23738843459952E-01):b := 1.28935216014150E+00+I*(-3.72231888677137E-01):c := -3.86018374093725E-01+I*(-9.52068197132676E-02):d := -4.25565015081412E-01+I*(-2.22820419109281E-01):e := -4.46790107958088E-01+I*(3.32869570389782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.84041805339421E-01+I*(5.08354737542913E-02):b := 1.27094378785394E+00+I*(-1.93091541069353E-02):c := -1.64655882880899E-01+I*(-2.97847398729587E-01):d := -3.92622669711415E-01+I*(-1.52585353062315E-01):e := -3.50590033107584E-01+I*(2.68312548436386E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.85564764278058E-01+I*(3.26634740075177E-01):b := 1.02998779559776E+00+I*(2.39212671939978E-01):c := 1.35172476839056E-01+I*(-3.10790021634501E-01):d := -4.12533599317929E-01+I*(-7.76072395670948E-02):e := -2.71560866289403E-01+I*(2.66109861987638E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.32846623046497E-01+I*(4.74609413623746E-01):b := 6.79230170077210E-01+I*(2.82368353906193E-01):c := 3.73173683332129E-01+I*(-1.27978691329569E-01):d := -4.75981258652730E-01+I*(-3.29691712169452E-02):e := -2.11888368560116E-01+I*(2.90180000329786E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.44137008576272E-01+I*(4.25520500091311E-01):b := 3.82794302510125E-01+I*(8.99648685777384E-02):c := 4.37984326991437E-01+I*(1.65047139013908E-01):d := -5.53277782770878E-01+I*(-3.95577962897705E-02):e := -1.65737990451475E-01+I*(3.32987276131081E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54736418720435E-02+I*(2.02337247682204E-01):b := 2.79385829848843E-01+I*(-2.47970054933650E-01):c := 2.99278787358717E-01+I*(4.31177426758865E-01):d := -6.08255268982315E-01+I*(-9.42902238895848E-02):e := -1.34858804769123E-01+I*(4.00224382494645E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.72643976660327E-02+I*(-9.05104193957957E-02):b := 4.17390725708736E-01+I*(-5.73312910188667E-01):c := 2.19589279684819E-02+I*(5.45886852560746E-01):d := -6.15189140482010E-01+I*(-1.71556542859258E-01):e := -1.43515062277533E-01+I*(5.04130098350187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.39602655732346E-01+I*(-3.15995823077604E-01):b := 7.32234965563387E-01+I*(-7.33832159430414E-01):c := -2.64214206903652E-01+I*(4.55501601233589E-01):d := -5.70834961733859E-01+I*(-2.35202983833398E-01):e := -2.69618504018608E-01+I*(6.09995795254153E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.27690347242025E-01+I*(-3.68611836989383E-01):b := 1.07659943048084E+00+I*(-6.54419061965939E-01):c := -4.25337026990887E-01+I*(2.02313936393546E-01):d := -4.95946545915908E-01+I*(-2.55448669728804E-01):e := -4.64848320910500E-01+I*(5.13793934187130E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.27739626291850E-01+I*(-1.61151827036392E-01):b := 1.32377438794136E+00+I*(-2.60427083553747E-01):c := -2.59028423977745E-01+I*(6.76999362110077E-02):d := -2.19280889580659E-01+I*(-4.49952800450043E-01):e := -2.74544871151185E-01+I*(4.27519671048057E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.29582187363696E-01+I*(1.13422490177851E-01):b := 1.30536601565379E+00+I*(9.24956510164552E-02):c := -3.76659327649194E-02+I*(-1.34940642805312E-01):d := -1.86338544210663E-01+I*(-3.79717734403077E-01):e := -2.42493124530588E-01+I*(3.34076220180616E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.31105146302332E-01+I*(3.89221756498737E-01):b := 1.06441002339762E+00+I*(3.51017477063368E-01):c := 2.62162426955036E-01+I*(-1.47883265710226E-01):d := -2.06249473817177E-01+I*(-3.04739620907857E-01):e := -1.84680330657843E-01+I*(2.97971570145101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.78387005070771E-01+I*(5.37196430047306E-01):b := 7.13652397877064E-01+I*(3.94173159029583E-01):c := 5.00163633448109E-01+I*(3.49280645947061E-02):d := -2.69697133151978E-01+I*(-2.60101552557707E-01):e := -1.31563762250675E-01+I*(2.94370721311652E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10322609399453E-01+I*(4.88107516514871E-01):b := 4.17216530309980E-01+I*(2.01769673701129E-01):c := 5.64974277107417E-01+I*(3.27953894938183E-01):d := -3.46993657270126E-01+I*(-2.66690177630533E-01):e := -8.54669707068960E-02+I*(3.10878928833477E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.99933259847769E-01+I*(2.64924264105764E-01):b := 3.13808057648697E-01+I*(-1.36165249810260E-01):c := 4.26268737474697E-01+I*(5.94084182683139E-01):d := -4.01971143481562E-01+I*(-3.21422605230347E-01):e := -4.67196194160321E-02+I*(3.47369776626901E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.01724015641758E-01+I*(-2.79234029722357E-02):b := 4.51812953508590E-01+I*(-4.61508105065277E-01):c := 1.48948878084462E-01+I*(7.08793608485021E-01):d := -4.08905014981258E-01+I*(-3.98688924200021E-01):e := -2.49650358288841E-02+I*(4.11931237926751E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.14856962243380E-01+I*(-2.53408806654045E-01):b := 7.66657193363241E-01+I*(-6.22027354307024E-01):c := -1.37224256787672E-01+I*(6.18408357157865E-01):d := -3.64550836233106E-01+I*(-4.62335365174161E-01):e := -5.94423408363704E-02+I*(5.04446151287522E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.73230729266300E-01+I*(-3.06024820565823E-01):b := 1.11102165828070E+00+I*(-5.42614256842549E-01):c := -2.98347076874908E-01+I*(3.65220692317821E-01):d := -2.89662420415156E-01+I*(-4.82581051069566E-01):e := -1.91943817670322E-01+I*(5.35818353012530E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.92582091259056E-01+I*(-2.76770880494094E-01):b := 1.27827660083048E+00+I*(-1.52653452347420E-01):c := -2.66462922601796E-01+I*(2.74121317822602E-01):d := 8.47397989472897E-02+I*(-4.91349419081607E-01):e := -1.10409129413935E-01+I*(5.13377209851220E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.94424652330902E-01+I*(-2.19656327985053E-03):b := 1.25986822854291E+00+I*(2.00269282222782E-01):c := -4.51004313889701E-02+I*(7.14807388062826E-02):d := 1.17682144317286E-01+I*(-4.21114353034642E-01):e := -1.44206659236191E-01+I*(4.11070826530115E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.95947611269538E-01+I*(2.73602703041035E-01):b := 1.01891223628674E+00+I*(4.58791108269695E-01):c := 2.54727928330985E-01+I*(5.85381159013686E-02):d := 9.77712147107727E-02+I*(-3.46136239539422E-01):e := -1.10139801669501E-01+I*(3.45026502600653E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67705299620232E-02+I*(4.21577376589604E-01):b := 6.68154610766184E-01+I*(5.01946790235910E-01):c := 4.92729134824058E-01+I*(2.41349446206300E-01):d := 3.43235553759713E-02+I*(-3.01498171189272E-01):e := -6.28304852746574E-02+I*(3.16793484099362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.45480144432248E-01+I*(3.72488463057169E-01):b := 3.71718743199100E-01+I*(3.09543304907456E-01):c := 5.57539778483366E-01+I*(5.34375276549777E-01):d := -4.29729687421764E-02+I*(-3.08086796262097E-01):e := -1.55319137502737E-02+I*(3.12086844101034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.35090794880563E-01+I*(1.49305210648062E-01):b := 2.68310270537818E-01+I*(-2.83916186039324E-02):c := 4.18834238850647E-01+I*(8.00505564294734E-01):d := -9.79504549536136E-02+I*(-3.62819223861911E-01):e := 3.04727215691465E-02+I*(3.26833015945467E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.36881550674552E-01+I*(-1.43542456429938E-01):b := 4.06315166397711E-01+I*(-3.53734473858949E-01):c := 1.41514379460411E-01+I*(9.15214990096616E-01):d := -1.04884326453309E-01+I*(-4.40085542831585E-01):e := 7.22001653918647E-02+I*(3.66832478692585E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.50014497276174E-01+I*(-3.69027860111746E-01):b := 7.21159406252362E-01+I*(-5.14253723100697E-01):c := -1.44658755411723E-01+I*(8.24829738769459E-01):d := -6.05301477051573E-02+I*(-5.03731983805725E-01):e := 8.90972746663569E-02+I*(4.44929886108567E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.19268057664947E-02+I*(-4.21643874023525E-01):b := 1.06552387116982E+00+I*(-4.34840625636222E-01):c := -3.05781575498958E-01+I*(5.71642073929416E-01):d := 1.43582681127929E-02+I*(-5.23977669701131E-01):e := 2.03821751755738E-02+I*(5.36942295578423E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.67594632959234E-02+I*(-5.16496563757551E-01):b := 1.17414771904962E+00+I*(-9.93394748700877E-02):c := -4.04843185434435E-01+I*(4.27470466547334E-01):d := 3.44242391526620E-01+I*(-3.27640337074097E-01):e := 9.23854600045878E-02+I*(6.13808599550056E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.88602024367769E-01+I*(-2.41922246543308E-01):b := 1.15573934676206E+00+I*(2.53583259700114E-01):c := -1.83480694221609E-01+I*(2.24829887531015E-01):d := 3.77184736896616E-01+I*(-2.57405271027132E-01):e := -3.31179174932060E-02+I*(5.24945500797344E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.01249833064054E-02+I*(3.38770197775780E-02):b := 9.14783354505886E-01+I*(5.12105085747027E-01):c := 1.16347665498345E-01+I*(2.11887264626101E-01):d := 3.57273807290102E-01+I*(-1.82427157531911E-01):e := -3.55115821499787E-02+I*(4.20441502910940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.62593157925156E-01+I*(1.81851693326147E-01):b := 5.64025728985331E-01+I*(5.55260767713243E-01):c := 3.54348871991419E-01+I*(3.94698594931033E-01):d := 2.93826147955301E-01+I*(-1.37789089181761E-01):e := 4.93235222178273E-03+I*(3.61142875231977E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.51302772395380E-01+I*(1.32762779793712E-01):b := 2.67589861418247E-01+I*(3.62857282384788E-01):c := 4.19159515650727E-01+I*(6.87724425274509E-01):d := 2.16529623837153E-01+I*(-1.44377714254587E-01):e := 5.46556308088383E-02+I*(3.32591634139433E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.40913422843695E-01+I*(-9.04204726153957E-02):b := 1.64181388756965E-01+I*(2.49223588733996E-02):c := 2.80453976018007E-01+I*(9.53854713019466E-01):d := 1.61552137625716E-01+I*(-1.99110141854401E-01):e := 1.08651668072645E-01+I*(3.25440539620960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.42704178637684E-01+I*(-3.83268139693395E-01):b := 3.02186284616858E-01+I*(-3.00420496381617E-01):c := 3.13411662777181E-03+I*(1.06856413882135E+00):d := 1.54618266126021E-01+I*(-2.76376460824075E-01):e := 1.67949904272631E-01+I*(3.42036597403372E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.55837125239306E-01+I*(-6.08753543375204E-01):b := 6.17030524471509E-01+I*(-4.60939745623365E-01):c := -2.83039018244362E-01+I*(9.78178887494191E-01):d := 1.98972444874173E-01+I*(-3.40022901798215E-01):e := 2.26754481776541E-01+I*(3.99912554959611E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.67749433729627E-01+I*(-6.61369557286982E-01):b := 9.61394989388963E-01+I*(-3.81526648158890E-01):c := -4.44161838331597E-01+I*(7.24991222654149E-01):d := 2.73860860692123E-01+I*(-3.60268587693621E-01):e := 2.34071374093099E-01+I*(5.23956026596223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59787326113909E-01+I*(-7.68158565373593E-01):b := 1.06011080364767E+00+I*(-1.25431353702254E-01):c := -6.09419549570959E-01+I*(4.55993611410954E-01):d := 4.37802741039398E-01+I*(-3.54268533226068E-02):e := 4.41431780077637E-01+I*(7.72646784692992E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.61629887185755E-01+I*(-4.93584248159349E-01):b := 1.04170243136011E+00+I*(2.27491380867948E-01):c := -3.88057058358133E-01+I*(2.53353032394635E-01):d := 4.70745086409394E-01+I*(3.48082127243580E-02):e := 1.18005620328995E-01+I*(7.62949349351758E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.63152846124391E-01+I*(-2.17784981838463E-01):b := 8.00746439103935E-01+I*(4.86013206914861E-01):c := -8.82286986381780E-02+I*(2.40410409489721E-01):d := 4.50834156802881E-01+I*(1.09786326219578E-01):e := 3.86808839093696E-02+I*(5.70681746200700E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.95652951071698E-02+I*(-6.98103082898947E-02):b := 4.49988813583380E-01+I*(5.29168888881076E-01):c := 1.49772507854896E-01+I*(4.23221739794653E-01):d := 3.87386497468080E-01+I*(1.54424394569728E-01):e := 7.47833994786317E-02+I*(4.52510211952918E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78274909577394E-01+I*(-1.18899221822329E-01):b := 1.53552946016296E-01+I*(3.36765403552621E-01):c := 2.14583151514203E-01+I*(7.16247570138129E-01):d := 3.10089973349932E-01+I*(1.47835769496903E-01):e := 1.33677478268965E-01+I*(3.86624296959528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67885560025710E-01+I*(-3.42082474231437E-01):b := 5.01444733550136E-02+I*(-1.16951995876657E-03):c := 7.58776118814839E-02+I*(9.82377857883086E-01):d := 2.55112487138495E-01+I*(9.31033418970885E-02):e := 2.01734023579229E-01+I*(3.49144680738315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.69676315819699E-01+I*(-6.34930141309437E-01):b := 1.88149369214906E-01+I*(-3.26512375213784E-01):c := -2.01442247508752E-01+I*(1.09708728368497E+00):d := 2.48178615638800E-01+I*(1.58370229274148E-02):e := 2.83770946887190E-01+I*(3.34572599600940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.82809262421320E-01+I*(-8.60415544991245E-01):b := 5.02993609069557E-01+I*(-4.87031624455531E-01):c := -4.87615382380885E-01+I*(1.00670203235781E+00):d := 2.92532794386951E-01+I*(-4.78094180467249E-02):e := 3.90719832680811E-01+I*(3.58206116493413E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.47215709116414E-02+I*(-9.13031558903024E-01):b := 8.47358073987011E-01+I*(-4.07618526991056E-01):c := -6.48738202468121E-01+I*(7.53514367517768E-01):d := 3.67421210204901E-01+I*(-6.80551039421311E-02):e := 5.12737635782405E-01+I*(4.85433054290730E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.77495131086187E-01+I*(-9.14001437874471E-01):b := 9.89524994720338E-01+I*(-2.18720408759416E-01):c := -7.84468460618856E-01+I*(3.46344455932329E-01):d := 3.21642920141135E-01+I*(2.48561095534415E-01):e := 1.60057156493119E+00+I*(1.18308458985125E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.79337692158033E-01+I*(-6.39427120660228E-01):b := 9.71116622432772E-01+I*(1.34202325810787E-01):c := -5.63105969406030E-01+I*(1.43703876916009E-01):d := 3.54585265511131E-01+I*(3.18796161581381E-01):e := 1.21862960191817E-01+I*(1.64945676806964E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.80860651096669E-01+I*(-3.63627854339342E-01):b := 7.30160630176600E-01+I*(3.92724151857699E-01):c := -2.63277609686075E-01+I*(1.30761254011095E-01):d := 3.34674335904618E-01+I*(3.93774275076601E-01):e := -3.08883564394336E-02+I*(9.36042140956718E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.28142509865108E-01+I*(-2.15653180790773E-01):b := 3.79403004656045E-01+I*(4.35879833823915E-01):c := -2.52764031930016E-02+I*(3.13572584316027E-01):d := 2.71226676569817E-01+I*(4.38412343426751E-01):e := 9.12823927505539E-02+I*(6.65898154643685E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.60567104605116E-01+I*(-2.64742094323208E-01):b := 8.29671370889603E-02+I*(2.43476348495460E-01):c := 3.95342404663061E-02+I*(6.06598414659503E-01):d := 1.93930152451669E-01+I*(4.31823718353926E-01):e := 2.09273490799005E-01+I*(5.29603904280445E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.50177755053432E-01+I*(-4.87925346732315E-01):b := -2.04413355723216E-02+I*(-9.44585750159280E-02):c := -9.91712991664134E-02+I*(8.72728702404460E-01):d := 1.38952666240232E-01+I*(3.77091290754111E-01):e := 3.25181895701308E-01+I*(4.39709932549516E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.51968510847421E-01+I*(-7.80773013810314E-01):b := 1.17563560287571E-01+I*(-4.19801430270945E-01):c := -3.76491158556649E-01+I*(9.87438128206342E-01):d := 1.32018794740536E-01+I*(2.99824971784437E-01):e := 4.60075484737171E-01+I*(3.69619746314201E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.65101457449042E-01+I*(-1.00625841749212E+00):b := 4.32407800142222E-01+I*(-5.80320679512693E-01):c := -6.62664293428783E-01+I*(8.97052876879186E-01):d := 1.76372973488688E-01+I*(2.36178530810297E-01):e := 6.55318117617298E-01+I*(3.16635368357794E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22986234060636E-01+I*(-1.05887443140390E+00):b := 7.76772265059676E-01+I*(-5.00907582048218E-01):c := -8.23787113516018E-01+I*(6.43865212039143E-01):d := 2.51261389306638E-01+I*(2.15932844914891E-01):e := 1.02505911496594E+00+I*(3.47442298795217E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.38014976713489E-01+I*(-8.85783680354045E-01):b := 9.95418176738604E-01+I*(-3.35555654387967E-01):c := -8.48082587646873E-01+I*(1.49829058574529E-01):d := 5.01154000027360E-02+I*(3.91442392052283E-01):e := -4.03445398409912E+00+I*(-3.29319185009344E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.39857537785336E-01+I*(-6.11209363139801E-01):b := 9.77009804451038E-01+I*(1.73670801822351E-02):c := -6.26720096434047E-01+I*(-5.28115204417903E-02):d := 8.30577453727321E-02+I*(4.61677458099248E-01):e := -1.74198570583112E+00+I*(6.26904448239313E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.41380496723972E-01+I*(-3.35410096818915E-01):b := 7.36053812194865E-01+I*(2.75888906229148E-01):c := -3.26891736714092E-01+I*(-6.57541433467046E-02):d := 6.31468157662186E-02+I*(5.36655571594469E-01):e := -7.69147601322884E-01+I*(8.46458230145430E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.88662355492411E-01+I*(-1.87435423270346E-01):b := 3.85296186674311E-01+I*(3.19044588195364E-01):c := -8.88905302210183E-02+I*(1.17057186958227E-01):d := -3.00843568582630E-04+I*(5.81293639944619E-01):e := -2.84248423481231E-01+I*(8.54210108347180E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.99527410221860E-02+I*(-2.36524336802781E-01):b := 8.88603191072259E-02+I*(1.26641102866909E-01):c := -2.40798865617105E-02+I*(4.10083017301704E-01):d := -7.75973676867305E-02+I*(5.74705014871793E-01):e := 6.25401248945766E-02+I*(8.19545331362394E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.96579094261293E-02+I*(-4.59707589211889E-01):b := -1.45481535540560E-02+I*(-2.11293820644479E-01):c := -1.62785426194430E-01+I*(6.76213305046661E-01):d := -1.32574853898167E-01+I*(5.19972587271979E-01):e := 3.84957879854164E-01+I*(7.56358911808979E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.14486652201187E-02+I*(-7.52555256289888E-01):b := 1.23456742305837E-01+I*(-5.36636675899496E-01):c := -4.40105285584666E-01+I*(7.90922730848543E-01):d := -1.39508725397862E-01+I*(4.42706268302305E-01):e := 7.67249073837301E-01+I*(6.40404063035204E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.54183881782600E-02+I*(-9.78040659971697E-01):b := 4.38300982160487E-01+I*(-6.97155925141244E-01):c := -7.26278420456800E-01+I*(7.00537479521386E-01):d := -9.51545466497109E-02+I*(3.79059827328165E-01):e := 1.36891137535412E+00+I*(3.55441390110215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.83506079687939E-01+I*(-1.03065667388348E+00):b := 7.82665447077942E-01+I*(-6.17742827676769E-01):c := -8.87401240544035E-01+I*(4.47349814681343E-01):d := -2.02661308317607E-02+I*(3.58814141432759E-01):e := 2.70594119834393E+00+I*(-1.03686550910397E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.63003681335040E-01+I*(-7.03942106186639E-01):b := 1.25187996985637E+00+I*(-2.29266859905044E-01):c := -1.22951492501147E+00+I*(3.13072174333303E-02):d := -1.91053968209606E-02+I*(3.25285626517049E-01):e := 6.17202202385445E-02+I*(3.37919000454082E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.64846242406886E-01+I*(-4.29367788972396E-01):b := 1.23347159756881E+00+I*(1.23655874665158E-01):c := -1.00815243379864E+00+I*(-1.71333361582989E-01):d := 1.38369485490355E-02+I*(3.95520692564014E-01):e := -7.29220679746169E-01+I*(1.23601143961477E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.66369201345522E-01+I*(-1.53568522651511E-01):b := 9.92515605312635E-01+I*(3.82177700712070E-01):c := -7.08324074078686E-01+I*(-1.84275984487903E-01):d := -6.07398105747766E-03+I*(4.70498806059234E-01):e := -3.28403412775944E-01+I*(8.05677954649495E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.13651060113961E-01+I*(-5.59384910294185E-03):b := 6.41757979792080E-01+I*(4.25333382678286E-01):c := -4.70322867585613E-01+I*(-1.46465418297133E-03):d := -6.95216403922790E-02+I*(5.15136874409384E-01):e := -8.92206712615986E-02+I*(6.67788457239252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24941445643736E-01+I*(-5.46827626353764E-02):b := 3.45322112224996E-01+I*(2.32929897349831E-01):c := -4.05512223926305E-01+I*(2.91561176160505E-01):d := -1.46818164510427E-01+I*(5.08548249336559E-01):e := 9.07428976741435E-02+I*(5.99622922563810E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.53307951954210E-02+I*(-2.77866015044484E-01):b := 2.41913639563714E-01+I*(-1.05005026161557E-01):c := -5.44217763559025E-01+I*(5.57691463905462E-01):d := -2.01795650721864E-01+I*(4.53815821736745E-01):e := 2.62098586071139E-01+I*(5.58497698411362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.35400394014317E-02+I*(-5.70713682122484E-01):b := 3.79918535423607E-01+I*(-4.30347881416574E-01):c := -8.21537622949261E-01+I*(6.72400889707344E-01):d := -2.08729522221559E-01+I*(3.76549502767070E-01):e := 4.67957159916531E-01+I*(5.37007660002272E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20407092799810E-01+I*(-7.96199085804292E-01):b := 6.94762775278257E-01+I*(-5.90867130658322E-01):c := -1.10771075782139E+00+I*(5.82015638380187E-01):d := -1.64375343473407E-01+I*(3.12903061792931E-01):e := 7.93239862013949E-01+I*(5.62820128605292E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.08494784309489E-01+I*(-8.48815099716071E-01):b := 1.03912724019571E+00+I*(-5.11454033193846E-01):c := -1.26883357790863E+00+I*(3.28827973540144E-01):d := -8.94869276554573E-02+I*(2.92657375897525E-01):e := 1.52078119702286E+00+I*(9.37800161988401E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.80453411395556E-01+I*(-4.42480180228060E-01):b := 1.36796356589459E+00+I*(-2.43751436054210E-01):c := -1.04703151533952E+00+I*(-6.54650086996384E-02):d := -2.06966264450646E-01+I*(8.26942962915906E-02):e := -5.98190492550133E-01+I*(9.10174285197890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.82295972467402E-01+I*(-1.67905863013817E-01):b := 1.34955519360702E+00+I*(1.09171298515991E-01):c := -8.25669024126694E-01+I*(-2.68105587715958E-01):d := -1.74023919080650E-01+I*(1.52929362338556E-01):e := -4.55953951718943E-01+I*(5.65669175399349E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.83818931406038E-01+I*(1.07893403307070E-01):b := 1.10859920135085E+00+I*(3.67693124562905E-01):c := -5.25840664406738E-01+I*(-2.81048210620872E-01):d := -1.93934848687163E-01+I*(2.27907475833776E-01):e := -2.90412561517621E-01+I*(4.72714385864349E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.31100790174477E-01+I*(2.55868076855638E-01):b := 7.57841575830295E-01+I*(4.10848806529120E-01):c := -2.87839457913665E-01+I*(-9.82368803159401E-02):d := -2.57382508021965E-01+I*(2.72545544183926E-01):e := -1.65290945949179E-01+I*(4.54668301674270E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.42391175704252E-01+I*(2.06779163323204E-01):b := 4.61405708263210E-01+I*(2.18445321200665E-01):c := -2.23028814254357E-01+I*(1.94788950027536E-01):d := -3.34679032140113E-01+I*(2.65956919111101E-01):e := -5.86041761622627E-02+I*(4.68447286417502E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.27805252559372E-02+I*(-1.64040890859036E-02):b := 3.57997235601928E-01+I*(-1.19489602310723E-01):c := -3.61734353887077E-01+I*(4.60919237772493E-01):d := -3.89656518351550E-01+I*(2.11224491511287E-01):e := 4.72030171204057E-02+I*(5.11427552171387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.09897694619478E-02+I*(-3.09251756163903E-01):b := 4.96002131461821E-01+I*(-4.44832457565740E-01):c := -6.39054213277312E-01+I*(5.75628663574375E-01):d := -3.96590389851245E-01+I*(1.33958172541613E-01):e := 1.64354494922161E-01+I*(6.09316576944744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.37856822860326E-01+I*(-5.34737159845712E-01):b := 8.10846371316472E-01+I*(-6.05351706807488E-01):c := -9.25227348149446E-01+I*(4.85243412247218E-01):d := -3.52236211103093E-01+I*(7.03117315674726E-02):e := 2.64066165838286E-01+I*(8.56311099920598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.25944514370006E-01+I*(-5.87353173757491E-01):b := 1.15521083623393E+00+I*(-5.25938609343012E-01):c := -1.08635016823668E+00+I*(2.32055747407175E-01):d := -2.77347795285143E-01+I*(5.00660456720667E-02):e := -5.67194797886981E-02+I*(1.30435564862146E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.25756193731386E-01+I*(-2.30972254485029E-01):b := 1.46619926565718E+00+I*(-1.80230167902991E-01):c := -8.45037125478863E-01+I*(-2.22987600665710E-02):d := -1.94941336891577E-01+I*(-2.23896082233788E-01):e := -2.39533091600018E-01+I*(5.89464325679495E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.27598754803232E-01+I*(4.36020627292142E-02):b := 1.44779089336961E+00+I*(1.72692566667211E-01):c := -6.23674634266038E-01+I*(-2.24939339082891E-01):d := -1.61998991521581E-01+I*(-1.53661016186822E-01):e := -2.37577999491471E-01+I*(4.39700609701833E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.29121713741868E-01+I*(3.19401329050100E-01):b := 1.20683490111344E+00+I*(4.31214392714124E-01):c := -3.23846274546082E-01+I*(-2.37881961987805E-01):d := -1.81909921128094E-01+I*(-7.86829026916020E-02):e := -1.71492933828997E-01+I*(3.70055163681992E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.76403572510307E-01+I*(4.67376002598669E-01):b := 8.56077275592882E-01+I*(4.74370074680339E-01):c := -8.58450680530087E-02+I*(-5.50706316828729E-02):d := -2.45357580462895E-01+I*(-3.40448343414518E-02):e := -1.05058673230386E-01+I*(3.48337983091204E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.76939580400824E-02+I*(4.18287089066234E-01):b := 5.59641408025797E-01+I*(2.81966589351885E-01):c := -2.10344243937011E-02+I*(2.37955198660603E-01):d := -3.22654104581043E-01+I*(-4.06334594142772E-02):e := -4.42905988765400E-02+I*(3.52788873496092E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01916692408233E-01+I*(1.95103836657127E-01):b := 4.56232935364515E-01+I*(-5.59683341595035E-02):c := -1.59739964026420E-01+I*(5.04085486405561E-01):d := -3.77631590792480E-01+I*(-9.53658870140915E-02):e := 1.32439407187286E-02+I*(3.80120990813743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.03707448202222E-01+I*(-9.77438304208725E-02):b := 5.94237831224408E-01+I*(-3.81311189414520E-01):c := -4.37059823416656E-01+I*(6.18794912207442E-01):d := -3.84565462292176E-01+I*(-1.72632205983765E-01):e := 6.46892383808408E-02+I*(4.41244790023475E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.31596051961563E-02+I*(-3.23229234102681E-01):b := 9.09082071079059E-01+I*(-5.41830438656268E-01):c := -7.23232958288790E-01+I*(5.28409660880286E-01):d := -3.40211283544024E-01+I*(-2.36278646957905E-01):e := 7.69242835962032E-02+I*(5.59170531689318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.71247296705836E-01+I*(-3.75845248014460E-01):b := 1.25344653599651E+00+I*(-4.62417341191793E-01):c := -8.84355778376025E-01+I*(2.75221996040243E-01):d := -2.65322867726074E-01+I*(-2.56524332853312E-01):e := -5.66908108062942E-02+I*(6.83066324999034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.71296575755661E-01+I*(-1.68385238061469E-01):b := 1.50062149345703E+00+I*(-6.84253627796007E-02):c := -7.18047175362883E-01+I*(1.40607995857704E-01):d := 1.13427886091753E-02+I*(-4.51028463574550E-01):e := -5.13115819736886E-02+I*(4.84807895512377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.73139136827507E-01+I*(1.06189079152775E-01):b := 1.48221312116946E+00+I*(2.84497371790602E-01):c := -4.96684684150057E-01+I*(-6.20325831586157E-02):d := 4.42851339791715E-02+I*(-3.80793397527584E-01):e := -9.87584212056910E-02+I*(4.02353887072884E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.74662095766143E-01+I*(3.81988345473661E-01):b := 1.24125712891329E+00+I*(5.43019197837514E-01):c := -1.96856324430102E-01+I*(-7.49752060635296E-02):d := 2.43742043726580E-02+I*(-3.05815284032364E-01):e := -7.87803703582176E-02+I*(3.37703582242612E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.21943954534582E-01+I*(5.29963019022229E-01):b := 8.90499503392736E-01+I*(5.86174879803730E-01):c := 4.11448820629714E-02+I*(1.07836124241402E-01):d := -3.90734549621433E-02+I*(-2.61177215682214E-01):e := -3.97500484811532E-02+I*(3.05855558186099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.66765659935643E-01+I*(4.80874105489794E-01):b := 5.94063635825652E-01+I*(3.93771394475275E-01):c := 1.05955525722279E-01+I*(4.00861954584879E-01):d := -1.16369979080291E-01+I*(-2.67765840755039E-01):e := 2.23360552381846E-03+I*(2.96334879488230E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.56376310383958E-01+I*(2.57690853080687E-01):b := 4.90655163164370E-01+I*(5.58364709638866E-02):c := -3.27500139104404E-02+I*(6.66992242329836E-01):d := -1.71347465291728E-01+I*(-3.22498268354853E-01):e := 4.43752433531142E-02+I*(3.04938209982735E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.58167066177947E-01+I*(-3.51568139973125E-02):b := 6.28660059024262E-01+I*(-2.69506384291130E-01):c := -3.10069873300676E-01+I*(7.81701668131718E-01):d := -1.78281336791424E-01+I*(-3.99764587324528E-01):e := 8.40066700355124E-02+I*(3.35819116920115E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.71300012779569E-01+I*(-2.60642217679121E-01):b := 9.43504298878913E-01+I*(-4.30025633532878E-01):c := -5.96243008172810E-01+I*(6.91316416804560E-01):d := -1.33927158043272E-01+I*(-4.63411028298667E-01):e := 1.05479729627909E-01+I*(3.99708440624281E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.16787678730110E-01+I*(-3.13258231590900E-01):b := 1.28786876379637E+00+I*(-3.50612536068403E-01):c := -7.57365828260045E-01+I*(4.38128751964518E-01):d := -5.90387422253216E-02+I*(-4.83656714194073E-01):e := 6.04856577067721E-02+I*(4.83161172843952E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.36139040722866E-01+I*(-2.84004291519171E-01):b := 1.45512370634615E+00+I*(3.93482684267265E-02):c := -7.25481673986934E-01+I*(3.47029377469299E-01):d := 3.15363477137124E-01+I*(-4.92425082206114E-01):e := 8.53114258322108E-02+I*(4.28345451893077E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.37981601794712E-01+I*(-9.42997430492765E-03):b := 1.43671533405858E+00+I*(3.92271002996929E-01):c := -5.04119182774108E-01+I*(1.44388798452979E-01):d := 3.48305822507121E-01+I*(-4.22190016159149E-01):e := 1.34794810351391E-02+I*(3.91721047837733E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.39504560733348E-01+I*(2.66369292015958E-01):b := 1.19575934180241E+00+I*(6.50792829043842E-01):c := -2.04290823054153E-01+I*(1.31446175548065E-01):d := 3.28394892900607E-01+I*(-3.47211902663929E-01):e := 8.78271796237672E-04+I*(3.31781061723719E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13213580498213E-01+I*(4.14343965564527E-01):b := 8.45001716281857E-01+I*(6.93948511010057E-01):c := 3.37103834389204E-02+I*(3.14257505852997E-01):d := 2.64947233565806E-01+I*(-3.02573834313778E-01):e := 2.08505776021801E-02+I*(2.90827510075479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.01923194968437E-01+I*(3.65255052032092E-01):b := 5.48565848714772E-01+I*(5.01545025681602E-01):c := 9.85210270982279E-02+I*(6.07283336196473E-01):d := 1.87650709447658E-01+I*(-3.09162459386604E-01):e := 5.18066245636795E-02+I*(2.69362569554473E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.91533845416753E-01+I*(1.42071799622985E-01):b := 4.45157376053491E-01+I*(1.63610102170214E-01):c := -4.01845125344913E-02+I*(8.73413623941430E-01):d := 1.32673223236221E-01+I*(-3.63894886986418E-01):e := 8.72662639972253E-02+I*(2.63782929222986E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.93324601210742E-01+I*(-1.50775867455014E-01):b := 5.83162271913383E-01+I*(-1.61732753084803E-01):c := -3.17504371924727E-01+I*(9.88123049743312E-01):d := 1.25739351736525E-01+I*(-4.41161205956092E-01):e := 1.25042238064074E-01+I*(2.75730235908487E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.06457547812363E-01+I*(-3.76261271136823E-01):b := 8.98006511768034E-01+I*(-3.22252002326551E-01):c := -6.03677506796860E-01+I*(8.97737798416155E-01):d := 1.70093530484677E-01+I*(-5.04807646930232E-01):e := 1.57787923479853E-01+I*(3.13594769454834E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.18369856302684E-01+I*(-4.28877285048602E-01):b := 1.24237097668549E+00+I*(-2.42838904862075E-01):c := -7.64800326884096E-01+I*(6.44550133576112E-01):d := 2.44981946302628E-01+I*(-5.25053332825638E-01):e := 1.56262358146244E-01+I*(3.81787767156849E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03164127597343E-02+I*(-5.23729974782628E-01):b := 1.35099482456530E+00+I*(9.26622459040581E-02):c := -8.63861936819573E-01+I*(5.00378526194031E-01):d := 5.74866069716454E-01+I*(-3.28716000198604E-01):e := 2.13627004679582E-01+I*(3.88355162058711E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32158973831580E-01+I*(-2.49155657568385E-01):b := 1.33258645227773E+00+I*(4.45584980474260E-01):c := -6.42499445606748E-01+I*(2.97737947177711E-01):d := 6.07808415086450E-01+I*(-2.58480934151638E-01):e := 1.26961182616969E-01+I*(3.97865726704483E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36819327702163E-02+I*(2.66436087525010E-02):b := 1.09163046002156E+00+I*(7.04106806521173E-01):c := -3.42671085886793E-01+I*(2.84795324272797E-01):d := 5.87897485479937E-01+I*(-1.83502820656418E-01):e := 8.14584065108382E-02+I*(3.45023781523623E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.19036208461345E-01+I*(1.74618282301070E-01):b := 7.40872834501004E-01+I*(7.47262488487389E-01):c := -1.04669879393719E-01+I*(4.67606654577729E-01):d := 5.24449826145135E-01+I*(-1.38864752306268E-01):e := 8.25942788267708E-02+I*(2.94039382172546E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.07745822931569E-01+I*(1.25529368768635E-01):b := 4.44436966933919E-01+I*(5.54859003158934E-01):c := -3.98592357344111E-02+I*(7.60632484921205E-01):d := 4.47153302026987E-01+I*(-1.45453377379093E-01):e := 1.04373285158399E-01+I*(2.60110383955497E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.97356473379884E-01+I*(-9.76538836404726E-02):b := 3.41028494272637E-01+I*(2.16924079647546E-01):c := -1.78564775367131E-01+I*(1.02676277266616E+00):d := 3.92175815815551E-01+I*(-2.00185804978908E-01):e := 1.35710184890221E-01+I*(2.41305690560775E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.99147229173874E-01+I*(-3.90501550718472E-01):b := 4.79033390132530E-01+I*(-1.08418775607472E-01):c := -4.55884634757366E-01+I*(1.14147219846804E+00):d := 3.85241944315855E-01+I*(-2.77452123948581E-01):e := 1.73961751040132E-01+I*(2.37760537376068E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.12280175775495E-01+I*(-6.15986954400281E-01):b := 7.93877629987180E-01+I*(-2.68938024849219E-01):c := -7.42057769629500E-01+I*(1.05108694714089E+00):d := 4.29596123064007E-01+I*(-3.41098564922721E-01):e := 2.16562152678354E-01+I*(2.56637719339946E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.24192484265816E-01+I*(-6.68602968312059E-01):b := 1.13824209490463E+00+I*(-1.89524927384744E-01):c := -9.03180589716735E-01+I*(7.97899282300845E-01):d := 5.04484538881957E-01+I*(-3.61344250818127E-01):e := 2.46261304804729E-01+I*(3.12053615780510E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03344275577720E-01+I*(-7.75391976398669E-01):b := 1.23695790916335E+00+I*(6.65703670718926E-02):c := -1.06843830095610E+00+I*(5.28901671057650E-01):d := 6.68426419229233E-01+I*(-3.65025164471140E-02):e := 3.67588892450565E-01+I*(3.55653521384997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.05186836649565E-01+I*(-5.00817659184426E-01):b := 1.21854953687578E+00+I*(4.19493101642094E-01):c := -8.47075809743271E-01+I*(3.26261092041331E-01):d := 7.01368764599229E-01+I*(3.37325495998513E-02):e := 2.70776771496170E-01+I*(4.30864304295992E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06709795588202E-01+I*(-2.25018392863540E-01):b := 9.77593544619607E-01+I*(6.78014927689007E-01):c := -5.47247450023316E-01+I*(3.13318469136417E-01):d := 6.81457834992716E-01+I*(1.08710663095071E-01):e := 1.76855871930999E-01+I*(3.89654545379724E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.46008345643359E-01+I*(-7.70437193149714E-02):b := 6.26835919099052E-01+I*(7.21170609655223E-01):c := -3.09246243530242E-01+I*(4.96129799441349E-01):d := 6.18010175657914E-01+I*(1.53348731445221E-01):e := 1.52816270356809E-01+I*(3.21967048473168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.34717960113584E-01+I*(-1.26132632847406E-01):b := 3.30400051531968E-01+I*(5.28767124326768E-01):c := -2.44435599870934E-01+I*(7.89155629784825E-01):d := 5.40713651539766E-01+I*(1.46760106372396E-01):e := 1.65163342869319E-01+I*(2.70254468867226E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.24328610561899E-01+I*(-3.49315885256513E-01):b := 2.26991578870686E-01+I*(1.90832200815380E-01):c := -3.83141139503654E-01+I*(1.05528591752978E+00):d := 4.85736165328329E-01+I*(9.20276787725814E-02):e := 1.93954809811291E-01+I*(2.35069978008320E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.26119366355889E-01+I*(-6.42163552334513E-01):b := 3.64996474730578E-01+I*(-1.34510654439638E-01):c := -6.60460998893890E-01+I*(1.16999534333166E+00):d := 4.78802293828634E-01+I*(1.47613598029078E-02):e := 2.34666189197703E-01+I*(2.14458857319711E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.39252312957510E-01+I*(-8.67648956016322E-01):b := 6.79840714585229E-01+I*(-2.95029903681385E-01):c := -9.46634133766023E-01+I*(1.07961009200451E+00):d := 5.23156472576786E-01+I*(-4.88850811712323E-02):e := 2.88409577511754E-01+I*(2.13721171235799E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.51164621447831E-01+I*(-9.20264969928100E-01):b := 1.02420517950268E+00+I*(-2.15616806216910E-01):c := -1.10775695385326E+00+I*(8.26422427164464E-01):d := 5.98044888394736E-01+I*(-6.91307670666379E-02):e := 3.49866537376248E-01+I*(2.53140727920380E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.21052080549998E-01+I*(-9.21234848899548E-01):b := 1.16637210023601E+00+I*(-2.67186879852683E-02):c := -1.24348721200399E+00+I*(4.19252515579025E-01):d := 5.52266598330970E-01+I*(2.47485432409909E-01):e := 6.15893109187406E-01+I*(3.35766082502824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.22894641621844E-01+I*(-6.46660531685305E-01):b := 1.14796372794844E+00+I*(3.26204046584933E-01):c := -1.02212472079117E+00+I*(2.16611936562706E-01):d := 5.85208943700966E-01+I*(3.17720498456874E-01):e := 5.04187272018570E-01+I*(5.57600485884230E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.24417600560480E-01+I*(-3.70861265364418E-01):b := 9.07007735692272E-01+I*(5.84725872631846E-01):c := -7.22296361071214E-01+I*(2.03669313657791E-01):d := 5.65298014094452E-01+I*(3.92698611952094E-01):e := 2.93810708254177E-01+I*(5.24717798370201E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.16994593289188E-02+I*(-2.22886591815850E-01):b := 5.56250110171717E-01+I*(6.27881554598061E-01):c := -4.84295154578140E-01+I*(3.86480643962723E-01):d := 5.01850354759651E-01+I*(4.37336680302244E-01):e := 2.30544230619974E-01+I*(4.08020438815261E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.17010155141306E-01+I*(-2.71975505348284E-01):b := 2.59814242604633E-01+I*(4.35478069269607E-01):c := -4.19484510918832E-01+I*(6.79506474306200E-01):d := 4.24553830641503E-01+I*(4.30748055229419E-01):e := 2.37097139258260E-01+I*(3.20301072080662E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.06620805589621E-01+I*(-4.95158757757392E-01):b := 1.56405769943351E-01+I*(9.75431457582185E-02):c := -5.58190050551551E-01+I*(9.45636762051157E-01):d := 3.69576344430066E-01+I*(3.76015627629604E-01):e := 2.69457113453140E-01+I*(2.58179386740902E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.08411561383610E-01+I*(-7.88006424835392E-01):b := 2.94410665803243E-01+I*(-2.27799709496799E-01):c := -8.35509909941787E-01+I*(1.06034618785304E+00):d := 3.62642472930371E-01+I*(2.98749308659930E-01):e := 3.19346750887532E-01+I*(2.12786191521702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21544507985232E-01+I*(-1.01349182851720E+00):b := 6.09254905657894E-01+I*(-3.88318958738547E-01):c := -1.12168304481392E+00+I*(9.69960936525882E-01):d := 4.06996651678523E-01+I*(2.35102867685790E-01):e := 3.92642870421212E-01+I*(1.84850877183906E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.65431835244477E-02+I*(-1.06610784242898E+00):b := 9.53619370575348E-01+I*(-3.08905861274070E-01):c := -1.28280586490116E+00+I*(7.16773271685839E-01):d := 4.81885067496473E-01+I*(2.14857181790385E-01):e := 5.02180245778177E-01+I*(1.98320776117415E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.81571926177300E-01+I*(-8.93017091379121E-01):b := 1.17226528225428E+00+I*(-1.43553933613821E-01):c := -1.30710133903201E+00+I*(2.22737118221225E-01):d := 2.80739078192570E-01+I*(3.90366728927776E-01):e := 1.25420666130562E+00+I*(4.70723593214718E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.83414487249146E-01+I*(-6.18442774164878E-01):b := 1.15385690996671E+00+I*(2.09368800956381E-01):c := -1.08573884781919E+00+I*(2.00965392049059E-02):d := 3.13681423562566E-01+I*(4.60601794974741E-01):e := 7.77977403983852E-01+I*(1.29885770548259E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.84937446187782E-01+I*(-3.42643507843992E-01):b := 9.12900917710538E-01+I*(4.67890627003294E-01):c := -7.85910488099230E-01+I*(7.15391629999177E-03):d := 2.93770493956053E-01+I*(5.35579908469962E-01):e := 2.29759535018802E-01+I*(9.12233610429972E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.32219304956221E-01+I*(-1.94668834295423E-01):b := 5.62143292189983E-01+I*(5.11046308969510E-01):c := -5.47909281606156E-01+I*(1.89965246604924E-01):d := 2.30322834621252E-01+I*(5.80217976820112E-01):e := 2.14752084467330E-01+I*(6.21337899826159E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.35096904859967E-02+I*(-2.43757747827858E-01):b := 2.65707424622898E-01+I*(3.18642823641055E-01):c := -4.83098637946848E-01+I*(4.82991076948400E-01):d := 1.53026310503104E-01+I*(5.73629351747286E-01):e := 2.73800434873007E-01+I*(4.65025465906506E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.46100959962319E-01+I*(-4.66941000236965E-01):b := 1.62298951961616E-01+I*(-1.92920998703331E-02):c := -6.21804177579568E-01+I*(7.49121364693357E-01):d := 9.80488242916670E-02+I*(5.18896924147472E-01):e := 3.48482924362940E-01+I*(3.61527580750760E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.47891715756308E-01+I*(-7.59788667314965E-01):b := 3.00303847821509E-01+I*(-3.44634955125350E-01):c := -8.99124036969804E-01+I*(8.63830790495239E-01):d := 9.11149527919714E-02+I*(4.41630605177798E-01):e := 4.41326525679551E-01+I*(2.79932223956841E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.89753376420706E-02+I*(-9.85274070996774E-01):b := 6.15148087676160E-01+I*(-5.05154204367098E-01):c := -1.18529717184194E+00+I*(7.73445539168082E-01):d := 1.35469131540123E-01+I*(3.77984164203658E-01):e := 5.75463139752927E-01+I*(2.10885514639595E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.27063029151750E-01+I*(-1.03789008490855E+00):b := 9.59512552593614E-01+I*(-4.25741106902622E-01):c := -1.34641999192917E+00+I*(5.20257874328039E-01):d := 2.10357547358073E-01+I*(3.57738478308252E-01):e := 8.14491653302896E-01+I*(1.81187190159623E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.24415343101797E-01+I*(-7.45764114044769E-01):b := 1.26393638516621E+00+I*(3.14901195976728E-02):c := -1.62800808618465E+00+I*(-2.07893534619882E-01):d := 1.58254013236651E-01+I*(4.72703663598613E-01):e := 1.10667015349653E+00+I*(5.51679956691157E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.26257904173644E-01+I*(-4.71189796830526E-01):b := 1.24552801287865E+00+I*(3.84412854167876E-01):c := -1.40664559497182E+00+I*(-4.10534113636202E-01):d := 1.91196358606647E-01+I*(5.42938729645578E-01):e := 1.30379181826688E+00+I*(8.40319596800395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.27780863112280E-01+I*(-1.95390530509640E-01):b := 1.00457202062248E+00+I*(6.42934680214789E-01):c := -1.10681723525187E+00+I*(-4.23476736541116E-01):d := 1.71285429000134E-01+I*(6.17916843140798E-01):e := 5.27981257393871E-01+I*(9.29375839492940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.75062721880719E-01+I*(-4.74158569610713E-02):b := 6.53814395101921E-01+I*(6.86090362181004E-01):c := -8.68816028758793E-01+I*(-2.40665406236184E-01):d := 1.07837769665333E-01+I*(6.62554911490949E-01):e := 3.53528937916332E-01+I*(6.16837599895675E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.86353107410494E-01+I*(-9.65047704935058E-02):b := 3.57378527534837E-01+I*(4.93686876852550E-01):c := -8.04005385099485E-01+I*(5.23604241072913E-02):d := 3.05412455471851E-02+I*(6.55966286418123E-01):e := 3.56122351113056E-01+I*(4.29915316210252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.25754303782120E-03+I*(-3.19688022902613E-01):b := 2.53970054873554E-01+I*(1.55751953341161E-01):c := -9.42710924732204E-01+I*(3.18490711852249E-01):d := -2.44362406642521E-02+I*(6.01233858818309E-01):e := 3.97071319094528E-01+I*(3.04824444480667E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04829883181052E-03+I*(-6.12535689980613E-01):b := 3.91974950733447E-01+I*(-1.69590901913856E-01):c := -1.22003078412244E+00+I*(4.33200137654130E-01):d := -3.13701121639477E-02+I*(5.23967539848635E-01):e := 4.59359756666097E-01+I*(2.04008647679956E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.81818754566568E-01+I*(-8.38021093662422E-01):b := 7.06819190588097E-01+I*(-3.30110151155604E-01):c := -1.50620391899457E+00+I*(3.42814886326974E-01):d := 1.29840665842041E-02+I*(4.60321098874495E-01):e := 5.54711712924707E-01+I*(1.10032475912924E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.69906446076247E-01+I*(-8.90637107574200E-01):b := 1.05118365550555E+00+I*(-2.50697053691129E-01):c := -1.66732673908181E+00+I*(8.96272214869313E-02):d := 8.78724824021542E-02+I*(4.40075412979089E-01):e := 7.27957404813474E-01+I*(2.27442236378009E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.41865073162314E-01+I*(-4.84302188086189E-01):b := 1.38001998120443E+00+I*(1.70055434485068E-02):c := -1.44552467651270E+00+I*(-3.04665760752851E-01):d := -2.96068543930347E-02+I*(2.30112333373155E-01):e := 9.32459205588988E-01+I*(1.22925891247605E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.43707634234160E-01+I*(-2.09727870871946E-01):b := 1.36161160891686E+00+I*(3.69928278018710E-01):c := -1.22416218529987E+00+I*(-5.07306339769171E-01):d := 3.33549097696158E-03+I*(3.00347399420120E-01):e := 4.77563949982426E-02+I*(1.21659870711108E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.45230593172796E-01+I*(6.60713954489403E-02):b := 1.12065561666069E+00+I*(6.28450104065622E-01):c := -9.24333825579919E-01+I*(-5.20248962674085E-01):d := -1.65754386295516E-02+I*(3.75325512915341E-01):e := -2.87604447117812E-02+I*(7.77208808099839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.92512451941235E-01+I*(2.14046068997509E-01):b := 7.69897991140136E-01+I*(6.71605786031838E-01):c := -6.86332619086845E-01+I*(-3.37437632369154E-01):d := -8.00230979643530E-02+I*(4.19963581265491E-01):e := 6.54682366554771E-02+I*(5.83757377414488E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.03802837471011E-01+I*(1.64957155465074E-01):b := 4.73462123573051E-01+I*(4.79202300703384E-01):c := -6.21521975427537E-01+I*(-4.44118020256776E-02):d := -1.57319622082501E-01+I*(4.13374956192666E-01):e := 1.65426302957879E-01+I*(4.83695061443388E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.41921870226951E-02+I*(-5.82260969440330E-02):b := 3.70053650911769E-01+I*(1.41267377191996E-01):c := -7.60227515060257E-01+I*(2.21718485719279E-01):d := -2.12297108293938E-01+I*(3.58642528592851E-01):e := 2.68430227277167E-01+I*(4.21506899383563E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.24014312287058E-02+I*(-3.51073764022033E-01):b := 5.08058546771661E-01+I*(-1.84075478063022E-01):c := -1.03754737445049E+00+I*(3.36427911521161E-01):d := -2.19230979793634E-01+I*(2.81376209623177E-01):e := 3.90834799971802E-01+I*(3.81978634251730E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.99268484627084E-01+I*(-5.76559167703841E-01):b := 8.22902786626312E-01+I*(-3.44594727304770E-01):c := -1.32372050932263E+00+I*(2.46042660194005E-01):d := -1.74876801045482E-01+I*(2.17729768649038E-01):e := 5.65681047996370E-01+I*(3.76635108033716E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.87356176136764E-01+I*(-6.29175181615620E-01):b := 1.16726725154377E+00+I*(-2.65181629840295E-01):c := -1.48484332940986E+00+I*(-7.14500464603753E-03):d := -9.99883852275315E-02+I*(1.97484082753631E-01):e := 8.55198861850988E-01+I*(5.09850689764672E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.87167855498144E-01+I*(-2.72794262343158E-01):b := 1.47825568096702E+00+I*(8.05268115997268E-02):c := -1.24353028665204E+00+I*(-2.61499512119784E-01):d := -1.75819268339658E-02+I*(-7.64780451522228E-02):e := 1.96966394220522E-01+I*(7.80050502658362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.89010416569991E-01+I*(1.78005487108524E-03):b := 1.45984730867945E+00+I*(4.33449546169929E-01):c := -1.02216779543922E+00+I*(-4.64140091136104E-01):d := 1.53604185360306E-02+I*(-6.24297910525763E-03):e := -2.41862275026011E-02+I*(6.61606337766611E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.90533375508626E-01+I*(2.77579321191971E-01):b := 1.21889131642328E+00+I*(6.91971372216842E-01):c := -7.22339435719263E-01+I*(-4.77082714041018E-01):d := -4.55051107048264E-03+I*(6.87351343899627E-02):e := -3.44815291360730E-02+I*(5.04317211809214E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.37815234277065E-01+I*(4.25553994740540E-01):b := 8.68133690902723E-01+I*(7.35127054183058E-01):c := -4.84338229226189E-01+I*(-2.94271383736086E-01):d := -6.79981704052839E-02+I*(1.13373202740113E-01):e := 1.80249931300349E-02+I*(4.19301660753657E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.91056198068405E-02+I*(3.76465081208105E-01):b := 5.71697823335638E-01+I*(5.42723568854603E-01):c := -4.19527585566881E-01+I*(-1.24555339261060E-03):d := -1.45294694523432E-01+I*(1.06784577667288E-01):e := 8.08617144285780E-02+I*(3.76378423763249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.40505030641475E-01+I*(1.53281828798998E-01):b := 4.68289350674356E-01+I*(2.04788645343215E-01):c := -5.58233125199600E-01+I*(2.64884734352346E-01):d := -2.00272180734869E-01+I*(5.20521500674734E-02):e := 1.49088758103438E-01+I*(3.58812025366751E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.42295786435464E-01+I*(-1.39565838279002E-01):b := 6.06294246534249E-01+I*(-1.20554209911803E-01):c := -8.35552984589836E-01+I*(3.79594160154229E-01):d := -2.07206052234564E-01+I*(-2.52141689022004E-02):e := 2.27698217530706E-01+I*(3.66882702639668E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.45712669629145E-02+I*(-3.65051241960811E-01):b := 9.21138486388899E-01+I*(-2.81073459153550E-01):c := -1.12172611946197E+00+I*(2.89208908827072E-01):d := -1.62851873486413E-01+I*(-8.88606098763404E-02):e := 3.19815109636074E-01+I*(4.22958471586998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.32658958472594E-01+I*(-4.17667255872589E-01):b := 1.26550295130635E+00+I*(-2.01660361689075E-01):c := -1.28284893954920E+00+I*(3.60212439870294E-02):d := -8.79634576684626E-02+I*(-1.09106295771746E-01):e := 3.78475084849326E-01+I*(5.87302937470470E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.32708237522419E-01+I*(-2.10207245919598E-01):b := 1.51267790876687E+00+I*(1.92331616723117E-01):c := -1.11654033653606E+00+I*(-9.85927561955091E-02):d := 1.88702198666787E-01+I*(-3.03610426492985E-01):e := 1.85672964883752E-01+I*(4.88409346793802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.34550798594265E-01+I*(6.43670712946452E-02):b := 1.49426953647930E+00+I*(5.45254351293319E-01):c := -8.95177845323237E-01+I*(-3.01233335211828E-01):d := 2.21644544036783E-01+I*(-2.33375360446020E-01):e := 7.14895517223146E-02+I*(4.66776728801639E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36073757532901E-01+I*(3.40166337615531E-01):b := 1.25331354422313E+00+I*(8.03776177340233E-01):c := -5.95349485603283E-01+I*(-3.14175958116743E-01):d := 2.01733614430270E-01+I*(-1.58397246950799E-01):e := 3.64975375956280E-02+I*(3.87577876236525E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.33556163013400E-02+I*(4.88141011164100E-01):b := 9.02555918702577E-01+I*(8.46931859306448E-01):c := -3.57348279110209E-01+I*(-1.31364627811811E-01):d := 1.38285955095469E-01+I*(-1.13759178600649E-01):e := 5.30303783420430E-02+I*(3.28792988867288E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.05353998168885E-01+I*(4.39052097631665E-01):b := 6.06120051135493E-01+I*(6.54528373977994E-01):c := -2.92537635450901E-01+I*(1.61661202531665E-01):d := 6.09894309773206E-02+I*(-1.20347803673474E-01):e := 8.68832654874529E-02+I*(2.94526546652647E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.94964648617200E-01+I*(2.15868845222558E-01):b := 5.02711578474210E-01+I*(3.16593450466605E-01):c := -4.31243175083620E-01+I*(4.27791490276622E-01):d := 6.01194476588335E-03+I*(-1.75080231273289E-01):e := 1.28335894434759E-01+I*(2.78687598453420E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.96755404411189E-01+I*(-7.69788218554419E-02):b := 6.40716474334103E-01+I*(-8.74940478841238E-03):c := -7.08563034473856E-01+I*(5.42500916078504E-01):d := -9.21926733812197E-04+I*(-2.52346550242963E-01):e := 1.76255897377051E-01+I*(2.81602907515526E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.09888351012811E-01+I*(-3.02464225537251E-01):b := 9.55560714188754E-01+I*(-1.69268654030160E-01):c := -9.94736169345989E-01+I*(4.52115664751347E-01):d := 4.34322520143396E-02+I*(-3.15992991217103E-01):e := 2.27558593480585E-01+I*(3.14006161171870E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.81993404968686E-02+I*(-3.55080239449029E-01):b := 1.29992517910621E+00+I*(-8.98555565656845E-02):c := -1.15585898943322E+00+I*(1.98927999911304E-01):d := 1.18320667832290E-01+I*(-3.36238677112509E-01):e := 2.54781717084369E-01+I*(3.95511643186808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.75507024896242E-02+I*(-3.25826299377300E-01):b := 1.46718012165599E+00+I*(3.00105247929444E-01):c := -1.12397483516011E+00+I*(1.07828625416086E-01):d := 4.92722887194736E-01+I*(-3.45007045124550E-01):e := 2.32282468480957E-01+I*(3.44931933255956E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.99393263561470E-01+I*(-5.12519821630570E-02):b := 1.44877174936843E+00+I*(6.53027982499647E-01):c := -9.02612343947288E-01+I*(-9.48119536002343E-02):d := 5.25665232564732E-01+I*(-2.74771979077584E-01):e := 1.57325008051380E-01+I*(3.67667138357213E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00916222500106E-01+I*(2.24547284157829E-01):b := 1.20781575711225E+00+I*(9.11549808546560E-01):c := -6.02783984227334E-01+I*(-1.07754576505148E-01):d := 5.05754302958219E-01+I*(-1.99793865582364E-01):e := 1.06951378254527E-01+I*(3.26921092117917E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.51801918731455E-01+I*(3.72521957706398E-01):b := 8.57058131591698E-01+I*(9.54705490512775E-01):c := -3.64782777734260E-01+I*(7.50567537997832E-02):d := 4.42306643623417E-01+I*(-1.55155797232214E-01):e := 1.00537858858444E-01+I*(2.79264368544233E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.40511533201679E-01+I*(3.23433044173963E-01):b := 5.60622264024613E-01+I*(7.62302005184321E-01):c := -2.99972134074952E-01+I*(3.68082584143259E-01):d := 3.65010119505270E-01+I*(-1.61744422305039E-01):e := 1.16561102713245E-01+I*(2.44899910650881E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.30122183649994E-01+I*(1.00249791764856E-01):b := 4.57213791363331E-01+I*(4.24367081672932E-01):c := -4.38677673707671E-01+I*(6.34212871888216E-01):d := 3.10032633293832E-01+I*(-2.16476849904853E-01):e := 1.43405098618549E-01+I*(2.24060591849393E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.31912939443984E-01+I*(-1.92597875313144E-01):b := 5.95218687223223E-01+I*(9.90242264179147E-02):c := -7.15997533097906E-01+I*(7.48922297690098E-01):d := 3.03098761794137E-01+I*(-2.93743168874527E-01):e := 1.77818201347358E-01+I*(2.16926218992194E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.45045886045605E-01+I*(-4.18083278994952E-01):b := 9.10062927077874E-01+I*(-6.14950228238329E-02):c := -1.00217066797004E+00+I*(6.58537046362942E-01):d := 3.47452940542288E-01+I*(-3.57389609848667E-01):e := 2.17686325331495E-01+I*(2.29429691112614E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.56958194535926E-01+I*(-4.70699292906731E-01):b := 1.25442739199533E+00+I*(1.79180746406424E-02):c := -1.16329348805727E+00+I*(4.05349381522899E-01):d := 4.22341356360239E-01+I*(-3.77635295744073E-01):e := 2.49836622719566E-01+I*(2.74398155307019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.27192547350795E-03+I*(-5.65551982640757E-01):b := 1.36305123987514E+00+I*(3.53419225406776E-01):c := -1.26235509799275E+00+I*(2.61177774140818E-01):d := 7.52225479774065E-01+I*(-1.81297963117040E-01):e := 2.86924775591109E-01+I*(2.49678565408065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.35706355983382E-02+I*(-2.90977665426514E-01):b := 1.34464286758757E+00+I*(7.06341959976978E-01):c := -1.04099260677993E+00+I*(5.85371951244982E-02):d := 7.85167825144062E-01+I*(-1.11062897070074E-01):e := 2.40261040132369E-01+I*(3.00381006248126E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.90640546302571E-03+I*(-1.51783991056281E-02):b := 1.10368687533140E+00+I*(9.64863786023892E-01):c := -7.41164247059973E-01+I*(4.55945722195841E-02):d := 7.65256895537549E-01+I*(-3.60847835748540E-02):e := 1.79414029607873E-01+I*(2.89830872925928E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.57624546694587E-01+I*(1.32796274442940E-01):b := 7.52929249810845E-01+I*(1.00801946799011E+00):c := -5.03163040566899E-01+I*(2.28405902524515E-01):d := 7.01809236202747E-01+I*(8.55328477529646E-03):e := 1.53689783583859E-01+I*(2.50307780754119E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.46334161164811E-01+I*(8.37073609105058E-02):b := 4.56493382243760E-01+I*(8.15615982661652E-01):c := -4.38352396907591E-01+I*(5.21431732867991E-01):d := 6.24512712084599E-01+I*(1.96465970247116E-03):e := 1.55403226961584E-01+I*(2.13783701987330E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.35944811613127E-01+I*(-1.39475891498602E-01):b := 3.53084909582478E-01+I*(4.77681059150264E-01):c := -5.77057936540310E-01+I*(7.87562020612948E-01):d := 5.69535225873162E-01+I*(-5.27677678973430E-02):e := 1.71973628000236E-01+I*(1.86861288279635E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.37735567407116E-01+I*(-4.32323558576601E-01):b := 4.91089805442370E-01+I*(1.52338203895247E-01):c := -8.54377795930545E-01+I*(9.02271446414830E-01):d := 5.62601354373466E-01+I*(-1.30034086867017E-01):e := 1.98590595831579E-01+I*(1.70394057071943E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.50868514008738E-01+I*(-6.57808962258410E-01):b := 8.05934045297021E-01+I*(-8.18104534650098E-03):c := -1.14055093080268E+00+I*(8.11886195087674E-01):d := 6.06955533121618E-01+I*(-1.93680527841157E-01):e := 2.34057088052924E-01+I*(1.68284429509263E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.62780822499058E-01+I*(-7.10424976170189E-01):b := 1.15029851021448E+00+I*(7.12320521179744E-02):c := -1.30167375088991E+00+I*(5.58698530247632E-01):d := 6.81843948939569E-01+I*(-2.13926213736563E-01):e := 2.72841542356396E-01+I*(1.91633165415871E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.47559373444773E-02+I*(-8.17213984256799E-01):b := 1.24901432447319E+00+I*(3.27327346574610E-01):c := -1.46693146212928E+00+I*(2.89700919004438E-01):d := 8.45785829286844E-01+I*(1.10915520634450E-01):e := 3.52716000088665E-01+I*(1.69927033266778E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.66598498416324E-01+I*(-5.42639667042556E-01):b := 1.23060595218562E+00+I*(6.80250081144812E-01):c := -1.24556897091645E+00+I*(8.70603399881183E-02):d := 8.78728174656841E-01+I*(1.81150586681415E-01):e := 3.36727318993807E-01+I*(2.45038656739560E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.81214573549596E-02+I*(-2.66840400721670E-01):b := 9.89649959929449E-01+I*(9.38771907191725E-01):c := -9.45740611196496E-01+I*(7.41177170832040E-02):d := 8.58817245050327E-01+I*(2.56128700176636E-01):e := 2.66359468807455E-01+I*(2.68545401267723E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84596683876602E-01+I*(-1.18865727173101E-01):b := 6.38892334408893E-01+I*(9.81927589157941E-01):c := -7.07739404703422E-01+I*(2.56929047388135E-01):d := 7.95369585715526E-01+I*(3.00766768526786E-01):e := 2.18139942931022E-01+I*(2.37351526192473E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.73306298346826E-01+I*(-1.67954640705535E-01):b := 3.42456466841809E-01+I*(7.89524103829486E-01):c := -6.42928761044114E-01+I*(5.49954877731611E-01):d := 7.18073061597378E-01+I*(2.94178143453961E-01):e := 2.04493781069325E-01+I*(1.96509280240288E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.62916948795142E-01+I*(-3.91137893114643E-01):b := 2.39047994180526E-01+I*(4.51589180318098E-01):c := -7.81634300676833E-01+I*(8.16085165476568E-01):d := 6.63095575385941E-01+I*(2.39445715854146E-01):e := 2.11579113360702E-01+I*(1.61654413837949E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.64707704589131E-01+I*(-6.83985560192643E-01):b := 3.77052890040419E-01+I*(1.26246325063081E-01):c := -1.05895416006707E+00+I*(9.30794591278450E-01):d := 6.56161703886245E-01+I*(1.62179396884472E-01):e := 2.32231944487250E-01+I*(1.35036744013023E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.77840651190753E-01+I*(-9.09470963874451E-01):b := 6.91897129895069E-01+I*(-3.42729241786670E-02):c := -1.34512729493920E+00+I*(8.40409339951294E-01):d := 7.00515882634397E-01+I*(9.85329559103320E-02):e := 2.65502468266615E-01+I*(1.19248585097625E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.89752959681073E-01+I*(-9.62086977786230E-01):b := 1.03626159481252E+00+I*(4.51401732858079E-02):c := -1.50625011502644E+00+I*(5.87221675111252E-01):d := 7.75404298452347E-01+I*(7.82872700149261E-02):e := 3.11162874226492E-01+I*(1.24206756074032E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.82463742316755E-01+I*(-9.63056856757677E-01):b := 1.17842851554585E+00+I*(2.34038291517449E-01):c := -1.64198037317717E+00+I*(1.80051763525813E-01):d := 7.29626008388582E-01+I*(3.94903469491472E-01):e := 4.47566138184570E-01+I*(8.99180955101183E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.84306303388601E-01+I*(-6.88482539543434E-01):b := 1.16002014325829E+00+I*(5.86961026087651E-01):c := -1.42061788196435E+00+I*(-2.25888154905066E-02):d := 7.62568353758578E-01+I*(4.65138535538438E-01):e := 4.78261164880664E-01+I*(1.96797016930134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.85829262327237E-01+I*(-4.12683273222548E-01):b := 9.19064151002113E-01+I*(8.45482852134564E-01):c := -1.12078952224439E+00+I*(-3.55314383954213E-02):d := 7.42657424152065E-01+I*(5.40116649033658E-01):e := 3.91962076869280E-01+I*(2.75319772267785E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.31111210956765E-02+I*(-2.64708599673979E-01):b := 5.68306525481558E-01+I*(8.88638534100779E-01):c := -8.82788315751320E-01+I*(1.47279891909510E-01):d := 6.79209764817263E-01+I*(5.84754717383808E-01):e := 3.05557513897739E-01+I*(2.52350224398540E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.55598493374548E-01+I*(-3.13797513206414E-01):b := 2.71870657914473E-01+I*(6.96235048772325E-01):c := -8.17977672092012E-01+I*(4.40305722252986E-01):d := 6.01913240699115E-01+I*(5.78166092310983E-01):e := 2.70675401912364E-01+I*(2.00094780043245E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.45209143822863E-01+I*(-5.36980765615521E-01):b := 1.68462185253191E-01+I*(3.58300125260937E-01):c := -9.56683211724731E-01+I*(7.06436009997943E-01):d := 5.46935754487678E-01+I*(5.23433664711169E-01):e := 2.67483479177835E-01+I*(1.51465348976091E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.46999899616853E-01+I*(-8.29828432693521E-01):b := 3.06467081113084E-01+I*(3.29572700059194E-02):c := -1.23400307111497E+00+I*(8.21145435799825E-01):d := 5.40001882987983E-01+I*(4.46167345741495E-01):e := 2.83301274788399E-01+I*(1.10385199973524E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.60132846218475E-01+I*(-1.05531383637533E+00):b := 6.21311320967734E-01+I*(-1.27561979235829E-01):c := -1.52017620598710E+00+I*(7.30760184472669E-01):d := 5.84356061736134E-01+I*(3.82520904767355E-01):e := 3.16474562098792E-01+I*(7.75686344505647E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.79548452912040E-02+I*(-1.10792985028711E+00):b := 9.65675785885189E-01+I*(-4.81488817713533E-02):c := -1.68129902607433E+00+I*(4.77572519632627E-01):d := 6.59244477554085E-01+I*(3.62275218871948E-01):e := 3.71880622974255E-01+I*(6.09824898779960E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.42983587944057E-01+I*(-9.34839099237251E-01):b := 1.18432169756412E+00+I*(1.17203045888897E-01):c := -1.70559450020519E+00+I*(-1.64636338319865E-02):d := 4.58098488250183E-01+I*(5.37784766009340E-01):e := 6.26989861102784E-01+I*(4.48229172323863E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.44826149015904E-01+I*(-6.60264782023007E-01):b := 1.16591332527655E+00+I*(4.70125780459100E-01):c := -1.48423200899236E+00+I*(-2.19104212848307E-01):d := 4.91040833620179E-01+I*(6.08019832056305E-01):e := 7.59849492035032E-01+I*(1.94198149170017E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.46349107954540E-01+I*(-3.84465515702121E-01):b := 9.24957333020379E-01+I*(7.28647606506013E-01):c := -1.18440364927241E+00+I*(-2.32046835753221E-01):d := 4.71129904013666E-01+I*(6.82997945551526E-01):e := 5.94539711498308E-01+I*(4.01260841627105E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.93630966722979E-01+I*(-2.36490842153553E-01):b := 5.74199707499824E-01+I*(7.71803288472228E-01):c := -9.46402442779337E-01+I*(-4.92355054482892E-02):d := 4.07682244678864E-01+I*(7.27636013901676E-01):e := 4.15961286432679E-01+I*(3.54417231855044E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.92135225275444E-03+I*(-2.85579755685987E-01):b := 2.77763839932739E-01+I*(5.79399803143774E-01):c := -8.81591799120029E-01+I*(2.43790324895187E-01):d := 3.30385720560716E-01+I*(7.21047388828851E-01):e := 3.54261466938458E-01+I*(2.59680725202272E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84689298195561E-01+I*(-5.08763008095095E-01):b := 1.74355367271457E-01+I*(2.41464879632386E-01):c := -1.02029733875275E+00+I*(5.09920612640144E-01):d := 2.75408234349279E-01+I*(6.66314961229036E-01):e := 3.45744019415851E-01+I*(1.79534495603189E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86480053989550E-01+I*(-8.01610675173094E-01):b := 3.12360263131350E-01+I*(-8.38779756226321E-02):c := -1.29761719814298E+00+I*(6.24630038442026E-01):d := 2.68474362849583E-01+I*(5.89048642259362E-01):e := 3.63599016526733E-01+I*(1.12043204910497E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.86999408827970E-04+I*(-1.02709607885490E+00):b := 6.27204502986001E-01+I*(-2.44397224864380E-01):c := -1.58379033301512E+00+I*(5.34244787114869E-01):d := 3.12828541597735E-01+I*(5.25402201285222E-01):e := 4.05239827915728E-01+I*(5.18276322108892E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.88474690918507E-01+I*(-1.07971209276668E+00):b := 9.71568967903454E-01+I*(-1.64984127399904E-01):c := -1.74491315310235E+00+I*(2.81057122274826E-01):d := 3.87716957415685E-01+I*(5.05156515389816E-01):e := 4.84055614074658E-01+I*(2.18983013070964E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.21737629492445E-01+I*(-8.02605736459289E-01):b := 1.10556077955462E+00+I*(2.38991269128621E-01):c := -1.77951627827477E+00+I*(-6.47278408067070E-01):d := 1.99360716065804E-01+I*(6.99636862966801E-01):e := 5.57696961592479E-01+I*(-2.82741103697243E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.23580190564292E-01+I*(-5.28031419245045E-01):b := 1.08715240726705E+00+I*(5.91914003698824E-01):c := -1.55815378706194E+00+I*(-8.49918987083390E-01):d := 2.32303061435800E-01+I*(7.69871929013766E-01):e := 8.12085511319045E-01+I*(-3.18798124763072E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.25103149502928E-01+I*(-2.52232152924159E-01):b := 8.46196415010879E-01+I*(8.50435829745737E-01):c := -1.25832542734199E+00+I*(-8.62861609988304E-01):d := 2.12392131829287E-01+I*(8.44850042508986E-01):e := 1.01082862133353E+00+I*(4.64252562647408E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.72385008271366E-01+I*(-1.04257479375591E-01):b := 4.95438789490324E-01+I*(8.93591511711952E-01):c := -1.02032422084891E+00+I*(-6.80050279683372E-01):d := 1.48944472494486E-01+I*(8.89488110859136E-01):e := 7.18656882678291E-01+I*(2.65402844937062E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.83675393801142E-01+I*(-1.53346392908025E-01):b := 1.99002921923240E-01+I*(7.01188026383497E-01):c := -9.55513577189607E-01+I*(-3.87024449339896E-01):d := 7.16479483763380E-02+I*(8.82899485786311E-01):e := 5.28572589269646E-01+I*(1.93761273827052E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.93525664717332E-03+I*(-3.76529645317133E-01):b := 9.55944492619574E-02+I*(3.63253102872109E-01):c := -1.09421911682233E+00+I*(-1.20894161594939E-01):d := 1.66704621649009E-02+I*(8.28167058186497E-01):e := 4.53525831329373E-01+I*(9.63826739188198E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.72601244116247E-03+I*(-6.69377312395133E-01):b := 2.33599345121850E-01+I*(3.79102476170917E-02):c := -1.37153897621256E+00+I*(-6.18473579305700E-03):d := 9.73659066520541E-03+I*(7.50900739216823E-01):e := 4.26612890555610E-01+I*(7.17662594272337E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.79141040957216E-01+I*(-8.94862716076941E-01):b := 5.48443584976501E-01+I*(-1.22609001624656E-01):c := -1.65771211108470E+00+I*(-9.65699871202145E-02):d := 5.40907694133566E-02+I*(6.87254298242683E-01):e := 4.27504701569819E-01+I*(-8.02313686821951E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.67228732466895E-01+I*(-9.47478729988720E-01):b := 8.92808049893955E-01+I*(-4.31959041601808E-02):c := -1.81883493117193E+00+I*(-3.49757651960256E-01):d := 1.28979185231307E-01+I*(6.67008612347277E-01):e := 4.59845397964359E-01+I*(-1.75761009067667E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.39187359552962E-01+I*(-5.41143810500709E-01):b := 1.22164437559283E+00+I*(2.24506692979455E-01):c := -1.59703286860282E+00+I*(-7.44050634200039E-01):d := 1.14998484361187E-02+I*(4.57045532741343E-01):e := 1.01429890317964E+00+I*(-2.78519919896402E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.41029920624808E-01+I*(-2.66569493286465E-01):b := 1.20323600330527E+00+I*(5.77429427549658E-01):c := -1.37567037739000E+00+I*(-9.46691213216359E-01):d := 4.44421938061147E-02+I*(5.27280598788308E-01):e := 1.77854989274065E+00+I*(1.67816482412876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.42552879563444E-01+I*(9.22977303442048E-03):b := 9.62280011049094E-01+I*(8.35951253596570E-01):c := -1.07584201767004E+00+I*(-9.59633836121272E-01):d := 2.45312641996014E-02+I*(6.02258712283528E-01):e := 9.64517569743888E-01+I*(1.04379410479554E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.89834738331883E-01+I*(1.57204446582989E-01):b := 6.11522385528539E-01+I*(8.79106935562786E-01):c := -8.37840811176967E-01+I*(-7.76822505816340E-01):d := -3.89163951351998E-02+I*(6.46896780633678E-01):e := 5.24024458273507E-01+I*(6.77122875806750E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.01125123861658E-01+I*(1.08115533050555E-01):b := 3.15086517961454E-01+I*(6.86703450234332E-01):c := -7.73030167517659E-01+I*(-4.83796675472864E-01):d := -1.16212919253348E-01+I*(6.40308155560853E-01):e := 4.60722019167595E-01+I*(4.30766642511803E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15144734133427E-02+I*(-1.15067719358553E-01):b := 2.11678045300172E-01+I*(3.48768526722943E-01):c := -9.11735707150378E-01+I*(-2.17666387727907E-01):d := -1.71190405464785E-01+I*(5.85575727961039E-01):e := 4.69760320936328E-01+I*(2.70050165584212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.72371761935341E-03+I*(-4.07915386436552E-01):b := 3.49682941160065E-01+I*(2.34256714679259E-02):c := -1.18905556654061E+00+I*(-1.02956961926025E-01):d := -1.78124276964480E-01+I*(5.08309408991365E-01):e := 5.06064704355475E-01+I*(1.40987024897372E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.96590771017732E-01+I*(-6.33400790118361E-01):b := 6.64527181014715E-01+I*(-1.37093577773822E-01):c := -1.47522870141275E+00+I*(-1.93342213253182E-01):d := -1.33770098216328E-01+I*(4.44662968017225E-01):e := 5.71043758742895E-01+I*(1.54611123605881E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.84678462527411E-01+I*(-6.86016804030140E-01):b := 1.00889164593217E+00+I*(-5.76804803093465E-02):c := -1.63635152149998E+00+I*(-4.46529878093225E-01):d := -5.88816823983780E-02+I*(4.24417282121819E-01):e := 6.97259554738180E-01+I*(-1.27515244749881E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.84490141888791E-01+I*(-3.29635884757678E-01):b := 1.31988007535542E+00+I*(2.88027961130675E-01):c := -1.39503847874216E+00+I*(-7.00884385566972E-01):d := 2.35247759951876E-02+I*(1.50455154215965E-01):e := 9.43706648444682E-01+I*(4.97256676383907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.86332702960638E-01+I*(-5.50615675434345E-02):b := 1.30147170306785E+00+I*(6.40950695700877E-01):c := -1.17367598752934E+00+I*(-9.03524964583291E-01):d := 5.64671213651837E-02+I*(2.20690220262930E-01):e := 6.09948187427522E-01+I*(9.62293216880090E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.87855661899274E-01+I*(2.20737698777451E-01):b := 1.06051571081168E+00+I*(8.99472521747790E-01):c := -8.73847627809384E-01+I*(-9.16467587488205E-01):d := 3.65561917586706E-02+I*(2.95668333758150E-01):e := 2.42994955505369E-01+I*(7.50867908819578E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.35137520667713E-01+I*(3.68712372326020E-01):b := 7.09758085291126E-01+I*(9.42628203714005E-01):c := -6.35846421316311E-01+I*(-7.33656257183273E-01):d := -2.68914675761307E-02+I*(3.40306402108300E-01):e := 2.09592216268538E-01+I*(5.38636411761297E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.64279061974883E-02+I*(3.19623458793585E-01):b := 4.13322217724041E-01+I*(7.50224718385551E-01):c := -5.71035777657003E-01+I*(-4.40630426839797E-01):d := -1.04187991694279E-01+I*(3.33717777035475E-01):e := 2.49882305794211E-01+I*(4.13448423049181E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43182744250827E-01+I*(9.64402063844780E-02):b := 3.09913745062759E-01+I*(4.12289794874163E-01):c := -7.09741317289722E-01+I*(-1.74500139094840E-01):d := -1.59165477905716E-01+I*(2.78985349435661E-01):e := 3.10253949120937E-01+I*(3.29933734082754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.44973500044817E-01+I*(-1.96407460693522E-01):b := 4.47918640922652E-01+I*(8.69469396191454E-02):c := -9.87061176679958E-01+I*(-5.97907132929585E-02):d := -1.66099349405411E-01+I*(2.01719030465987E-01):e := 3.89047202609629E-01+I*(2.67253596218288E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.18935533535621E-02+I*(-4.21892864375330E-01):b := 7.62762880777303E-01+I*(-7.35723096226021E-02):c := -1.27323431155209E+00+I*(-1.50175964620115E-01):d := -1.21745170657259E-01+I*(1.38072589491847E-01):e := 5.02903817483567E-01+I*(2.22679848838985E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.29981244863241E-01+I*(-4.74508878287109E-01):b := 1.10712734569476E+00+I*(5.84078784187288E-03):c := -1.43435713163933E+00+I*(-4.03363629460158E-01):d := -4.68567548393093E-02+I*(1.17826903596441E-01):e := 6.91627999923907E-01+I*(2.31341316901023E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.30030523913067E-01+I*(-2.67048868334118E-01):b := 1.35430230315527E+00+I*(3.99832766254065E-01):c := -1.26804852862618E+00+I*(-5.37977629642697E-01):d := 2.29808901495940E-01+I*(-7.66772271247972E-02):e := 4.83133844431385E-01+I*(4.09232691934512E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.31873084984913E-01+I*(7.52544888012580E-03):b := 1.33589393086771E+00+I*(7.52755500824267E-01):c := -1.04668603741336E+00+I*(-7.40618208659016E-01):d := 2.62751246865936E-01+I*(-6.44216107783208E-03):e := 3.42218488387421E-01+I*(5.36243412945553E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.33396043923549E-01+I*(2.83324715201012E-01):b := 1.09493793861153E+00+I*(1.01127732687118E+00):c := -7.46857677693404E-01+I*(-7.53560831563930E-01):d := 2.42840317259423E-01+I*(6.85359524173882E-02):e := 2.02175948752109E-01+I*(4.72327792523456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.06779026919876E-02+I*(4.31299388749580E-01):b := 7.44180313090980E-01+I*(1.05443300883740E+00):c := -5.08856471200331E-01+I*(-5.70749501258998E-01):d := 1.79392657924621E-01+I*(1.13174020767538E-01):e := 1.72082844967841E-01+I*(3.76727580539600E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.08031711778237E-01+I*(3.82210475217146E-01):b := 4.47744445523896E-01+I*(8.62029523508942E-01):c := -4.44045827541023E-01+I*(-2.77723670915522E-01):d := 1.02096133806474E-01+I*(1.06585395694713E-01):e := 1.89329597751297E-01+I*(3.08292236604119E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.97642362226552E-01+I*(1.59027222808038E-01):b := 3.44335972862614E-01+I*(5.24094599997553E-01):c := -5.82751367173742E-01+I*(-1.15933831705652E-02):d := 4.71186475950363E-02+I*(5.18529680948988E-02):e := 2.25550337000971E-01+I*(2.61856711034938E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.99433118020541E-01+I*(-1.33820444269962E-01):b := 4.82340868722506E-01+I*(1.98751744742535E-01):c := -8.60071226563978E-01+I*(1.03116042631317E-01):d := 4.01847760953409E-02+I*(-2.54133508747750E-02):e := 2.76176138044605E-01+I*(2.32100054171859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.12566064622163E-01+I*(-3.59305847951770E-01):b := 7.97185108577157E-01+I*(3.82324955007877E-02):c := -1.14624436143611E+00+I*(1.27307913041599E-02):d := 8.45389548434925E-02+I*(-8.90597918489149E-02):e := 3.45658909409750E-01+I*(2.23839274562638E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.55216268875165E-02+I*(-4.11921861863549E-01):b := 1.14154957349461E+00+I*(1.17645592965263E-01):c := -1.30736718152335E+00+I*(-2.40456873535883E-01):d := 1.59427370661443E-01+I*(-1.09305477744321E-01):e := 4.35664529397723E-01+I*(2.64794782655921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.48729888802727E-02+I*(-3.82667921791820E-01):b := 1.30880451604439E+00+I*(5.07606397460393E-01):c := -1.27548302725024E+00+I*(-3.31556248031103E-01):d := 5.33829590023888E-01+I*(-1.18073845756362E-01):e := 3.74051254688909E-01+I*(2.45557003592267E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.96715549952119E-01+I*(-1.08093604577576E-01):b := 1.29039614375683E+00+I*(8.60529132030594E-01):c := -1.05412053603741E+00+I*(-5.34196827047422E-01):d := 5.66771935393884E-01+I*(-4.78387797093969E-02):e := 3.26591015407718E-01+I*(3.31356957283786E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.82385088907544E-02+I*(1.67705661743310E-01):b := 1.04944015150066E+00+I*(1.11905095807751E+00):c := -7.54292176317455E-01+I*(-5.47139449952336E-01):d := 5.46861005787371E-01+I*(2.71393337858234E-02):e := 2.37294852609689E-01+I*(3.31277507210596E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.54479632340807E-01+I*(3.15680335291878E-01):b := 6.98682525980101E-01+I*(1.16220664004372E+00):c := -5.16290969824381E-01+I*(-3.64328119647404E-01):d := 4.83413346452570E-01+I*(7.17774021359733E-02):e := 1.94990935350272E-01+I*(2.81066906994921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.43189246811031E-01+I*(2.66591421759444E-01):b := 4.02246658413017E-01+I*(9.69803154715268E-01):c := -4.51480326165074E-01+I*(-7.13022893039278E-02):d := 4.06116822334423E-01+I*(6.51887770631482E-02):e := 1.91620224422394E-01+I*(2.32624794856980E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.32799897259347E-01+I*(4.34081693503356E-02):b := 2.98838185751734E-01+I*(6.31868231203880E-01):c := -5.90185865797793E-01+I*(1.94827998441029E-01):d := 3.51139336122986E-01+I*(1.04563494633342E-02):e := 2.08105984469244E-01+I*(1.95587792657503E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.34590653053336E-01+I*(-2.49439497727664E-01):b := 4.36843081611627E-01+I*(3.06525375948863E-01):c := -8.67505725188029E-01+I*(3.09537424242911E-01):d := 3.44205464623290E-01+I*(-6.68099695063394E-02):e := 2.37770882971206E-01+I*(1.69806764248043E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.47723599654957E-01+I*(-4.74924901409473E-01):b := 7.51687321466277E-01+I*(1.46006126707115E-01):c := -1.15367886006016E+00+I*(2.19152172915754E-01):d := 3.88559643371442E-01+I*(-1.30456410480479E-01):e := 2.80664843532858E-01+I*(1.58504491517321E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.59635908145278E-01+I*(-5.27540915321251E-01):b := 1.09605178638373E+00+I*(2.25419224171590E-01):c := -1.31480168014740E+00+I*(-3.40354919242891E-02):d := 4.63448059189392E-01+I*(-1.50702096375885E-01):e := 3.35552620548974E-01+I*(1.75635976414114E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09496390828605E-02+I*(-6.22393605055277E-01):b := 1.20467563426354E+00+I*(5.60920374937724E-01):c := -1.41386329008288E+00+I*(-1.78207099306370E-01):d := 7.93332182603219E-01+I*(4.56352362511485E-02):e := 3.47927899596032E-01+I*(1.32847871836265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.08929219889860E-02+I*(-3.47819287841034E-01):b := 1.18626726197598E+00+I*(9.13843109507926E-01):c := -1.19250079887005E+00+I*(-3.80847678322689E-01):d := 8.26274527973215E-01+I*(1.15870302298114E-01):e := 3.45993973277262E-01+I*(2.03206627665945E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.58411907237801E-03+I*(-7.20200215201479E-02):b := 9.45311269719803E-01+I*(1.17236493555484E+00):c := -8.92672439150095E-01+I*(-3.93790301227603E-01):d := 8.06363598366701E-01+I*(1.90848415793334E-01):e := 2.84945233313232E-01+I*(2.37726423437120E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.60302260303939E-01+I*(7.59546520284208E-02):b := 5.94553644199248E-01+I*(1.21552061752105E+00):c := -6.54671232657021E-01+I*(-2.10978970922671E-01):d := 7.42915939031900E-01+I*(2.35486484143484E-01):e := 2.33678763539680E-01+I*(2.16120701118656E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.49011874774164E-01+I*(2.68657384959862E-02):b := 2.98117776632163E-01+I*(1.02311713219260E+00):c := -5.89860588997713E-01+I*(8.20468594208045E-02):d := 6.65619414913752E-01+I*(2.28897859070659E-01):e := 2.14556766124601E-01+I*(1.78864150362775E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.38622525222479E-01+I*(-1.96317513913121E-01):b := 1.94709303970881E-01+I*(6.85182208681212E-01):c := -7.28566128630433E-01+I*(3.48177147165762E-01):d := 6.10641928702315E-01+I*(1.74165431470845E-01):e := 2.16814647128551E-01+I*(1.44647658936766E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.40413281016468E-01+I*(-4.89165180991121E-01):b := 3.32714199830774E-01+I*(3.59839353426195E-01):c := -1.00588598802067E+00+I*(4.62886572967643E-01):d := 6.03708057202620E-01+I*(9.68991125011705E-02):e := 2.33130288708708E-01+I*(1.17089384789503E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.53546227618090E-01+I*(-7.14650584672930E-01):b := 6.47558439685424E-01+I*(1.99320104184447E-01):c := -1.29205912289280E+00+I*(3.72501321640486E-01):d := 6.48062235950772E-01+I*(3.32526715270308E-02):e := 2.62167962998161E-01+I*(9.86128354582550E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65458536108410E-01+I*(-7.67266598584708E-01):b := 9.91922904602879E-01+I*(2.78733201648923E-01):c := -1.45318194298004E+00+I*(1.19313656800444E-01):d := 7.22950651768722E-01+I*(1.30069856316249E-02):e := 3.04319329285750E-01+I*(9.76184175662522E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.20782237351253E-02+I*(-8.74055606671319E-01):b := 1.09063871886159E+00+I*(5.34828496105558E-01):c := -1.61843965421940E+00+I*(-1.49683954442750E-01):d := 8.86892532115997E-01+I*(3.37848720002638E-01):e := 3.48777285437113E-01+I*(4.20168719283248E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.63920784806972E-01+I*(-5.99481289457075E-01):b := 1.07223034657402E+00+I*(8.87751230675760E-01):c := -1.39707716300657E+00+I*(-3.52324533459069E-01):d := 9.19834877485993E-01+I*(4.08083786049603E-01):e := 3.79476402377061E-01+I*(9.91954793355377E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.54437437456075E-02+I*(-3.23682023136189E-01):b := 8.31274354317851E-01+I*(1.14627305672267E+00):c := -1.09724880328662E+00+I*(-3.65267156363983E-01):d := 8.99923947879480E-01+I*(4.83061899544823E-01):e := 3.44572404812207E-01+I*(1.60092870933289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.87274397485954E-01+I*(-1.75707349587621E-01):b := 4.80516728797296E-01+I*(1.18942873868889E+00):c := -8.59247596793544E-01+I*(-1.82455826059052E-01):d := 8.36476288544679E-01+I*(5.27699967894974E-01):e := 2.85730193967015E-01+I*(1.65051503410567E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.75984011956178E-01+I*(-2.24796263120055E-01):b := 1.84080861230212E-01+I*(9.97025253360434E-01):c := -7.94436953134237E-01+I*(1.10570004284424E-01):d := 7.59179764426531E-01+I*(5.21111342822148E-01):e := 2.51122611801841E-01+I*(1.37126854323299E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.65594662404494E-01+I*(-4.47979515529163E-01):b := 8.06723885689293E-02+I*(6.59090329849046E-01):c := -9.33142492766956E-01+I*(3.76700292029381E-01):d := 7.04202278215094E-01+I*(4.66378915222334E-01):e := 2.40338981450737E-01+I*(1.03548690422207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.67385418198483E-01+I*(-7.40827182607163E-01):b := 2.18677284428822E-01+I*(3.33747474594028E-01):c := -1.21046235215719E+00+I*(4.91409717831263E-01):d := 6.97268406715398E-01+I*(3.89112596252660E-01):e := 2.45812346431156E-01+I*(7.24396476571969E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.80518364800105E-01+I*(-9.66312586288971E-01):b := 5.33521524283473E-01+I*(1.73228225352281E-01):c := -1.49663548702933E+00+I*(4.01024466504107E-01):d := 7.41622585463551E-01+I*(3.25466155278520E-01):e := 2.65177904638222E-01+I*(4.63489761866672E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.92430673290425E-01+I*(-1.01892860020075E+00):b := 8.77885989200927E-01+I*(2.52641322816756E-01):c := -1.65775830711656E+00+I*(1.47836801664064E-01):d := 8.16511001281501E-01+I*(3.05220469383114E-01):e := 3.00131546546901E-01+I*(3.08044858131290E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.79786028707404E-01+I*(-1.01989847917220E+00):b := 1.02005290993425E+00+I*(4.41539441048396E-01):c := -1.79348856526730E+00+I*(-2.59333109921376E-01):d := 7.70732711217734E-01+I*(6.21836668859661E-01):e := 3.68309907116821E-01+I*(-4.63915457756347E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.81628589779250E-01+I*(-7.45324161957953E-01):b := 1.00164453764669E+00+I*(7.94462175618598E-01):c := -1.57212607405447E+00+I*(-4.61973688937695E-01):d := 8.03675056587730E-01+I*(6.92071734906626E-01):e := 4.32213579702931E-01+I*(-6.03941181318717E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.83151548717886E-01+I*(-4.69524895637068E-01):b := 7.60688545390516E-01+I*(1.05298400166551E+00):c := -1.27229771433452E+00+I*(-4.74916311842609E-01):d := 7.83764126981217E-01+I*(7.67049848401846E-01):e := 4.31598943771274E-01+I*(8.34564286571542E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.04334074863247E-02+I*(-3.21550222088499E-01):b := 4.09930919869961E-01+I*(1.09613968363173E+00):c := -1.03429650784144E+00+I*(-2.92104981537677E-01):d := 7.20316467646416E-01+I*(8.11687916751996E-01):e := 3.62915648849722E-01+I*(1.23198950083847E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.58276206983900E-01+I*(-3.70639135620933E-01):b := 1.13495052302877E-01+I*(9.03736198303273E-01):c := -9.69485864182134E-01+I*(9.20848805799012E-04):d := 6.43019943528268E-01+I*(8.05099291679171E-01):e := 3.07148439052908E-01+I*(1.05181846536631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.47886857432215E-01+I*(-5.93822388030041E-01):b := 1.00865796415944E-02+I*(5.65801274791884E-01):c := -1.10819140381485E+00+I*(2.67051136550756E-01):d := 5.88042457316831E-01+I*(7.50366864079357E-01):e := 2.80613956913118E-01+I*(6.98104504842627E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.49677613226204E-01+I*(-8.86670055108041E-01):b := 1.48091475501487E-01+I*(2.40458419536867E-01):c := -1.38551126320509E+00+I*(3.81760562352637E-01):d := 5.81108585817135E-01+I*(6.73100545109683E-01):e := 2.74711814333274E-01+I*(3.25979768350659E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.62810559827826E-01+I*(-1.11215545878985E+00):b := 4.62935715356137E-01+I*(7.99391702951193E-02):c := -1.67168439807722E+00+I*(2.91375311025480E-01):d := 6.25462764565287E-01+I*(6.09454104135543E-01):e := 2.85207163159011E-01+I*(-3.05301710207495E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.52771316818538E-02+I*(-1.16477147270163E+00):b := 8.07300180273592E-01+I*(1.59352267759595E-01):c := -1.83280721816446E+00+I*(3.81876461854374E-02):d := 7.00351180383237E-01+I*(5.89208418240137E-01):e := 3.14446732276414E-01+I*(-3.38786575974380E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.40305874334705E-01+I*(-9.91680721651770E-01):b := 1.02594609195252E+00+I*(3.24704195419845E-01):c := -1.85710269229531E+00+I*(-4.55848507279175E-01):d := 4.99205191079335E-01+I*(7.64717965377528E-01):e := 4.18404582675806E-01+I*(-1.49351234259977E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.42148435406552E-01+I*(-7.17106404437527E-01):b := 1.00753771966495E+00+I*(6.77626929990047E-01):c := -1.63574020108249E+00+I*(-6.58489086295494E-01):d := 5.32147536449332E-01+I*(8.34953031424493E-01):e := 5.32853088198638E-01+I*(-1.36930149103177E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.43671394345188E-01+I*(-4.41307138116641E-01):b := 7.66581727408782E-01+I*(9.36148756036960E-01):c := -1.33591184136253E+00+I*(-6.71431709200408E-01):d := 5.12236606842818E-01+I*(9.09931144919714E-01):e := 5.94970030023380E-01+I*(4.18006429213532E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.90953253113627E-01+I*(-2.93332464568073E-01):b := 4.15824101888227E-01+I*(9.79304438003176E-01):c := -1.09791063486946E+00+I*(-4.88620378895477E-01):d := 4.48788947508017E-01+I*(9.54569213269864E-01):e := 4.97674553547483E-01+I*(1.08638492820689E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24363864340238E-03+I*(-3.42421378100507E-01):b := 1.19388234321142E-01+I*(7.86900952674722E-01):c := -1.03309999121015E+00+I*(-1.95594548552001E-01):d := 3.71492423389869E-01+I*(9.47980588197039E-01):e := 3.99576421421642E-01+I*(9.77823326783943E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.87367011804913E-01+I*(-5.65604630509614E-01):b := 1.59797616598600E-02+I*(4.48966029163333E-01):c := -1.17180553084287E+00+I*(7.05357391929566E-02):d := 3.16514937178432E-01+I*(8.93248160597224E-01):e := 3.49098881744430E-01+I*(5.16600092896914E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.89157767598903E-01+I*(-8.58452297587614E-01):b := 1.53984657519753E-01+I*(1.23623173908316E-01):c := -1.44912539023311E+00+I*(1.85245164994839E-01):d := 3.09581065678737E-01+I*(8.15981841627550E-01):e := 3.29287197815813E-01+I*(6.38520876458155E-04):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.29071420052455E-03+I*(-1.08393770126942E+00):b := 4.68828897374403E-01+I*(-3.68960753334321E-02):c := -1.73529852510524E+00+I*(9.48599136676824E-02):d := 3.53935244426889E-01+I*(7.52335400653410E-01):e := 3.30693653944523E-01+I*(-5.12433092228842E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.85796977309155E-01+I*(-1.13655371518120E+00):b := 8.13193362291858E-01+I*(4.25170221310434E-02):c := -1.89642134519247E+00+I*(-1.58327751172361E-01):d := 4.28823660244839E-01+I*(7.32089714758004E-01):e := 3.55476425754080E-01+I*(-1.04104041685563E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.56223472464271E-01+I*(-8.47870146578179E-01):b := 8.50858859036045E-01+I*(2.96144494703867E-01):c := -1.61314713437687E+00+I*(-1.08125433740336E+00):d := 8.49804285626242E-02+I*(8.99900658555658E-01):e := 2.96547340212818E-01+I*(-3.66334634121579E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.58066033536117E-01+I*(-5.73295829363936E-01):b := 8.32450486748479E-01+I*(6.49067229274069E-01):c := -1.39178464316404E+00+I*(-1.28389491641968E+00):d := 1.17922773932620E-01+I*(9.70135724602622E-01):e := 3.53433652254450E-01+I*(-4.87244629892111E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.59588992474754E-01+I*(-2.97496563043049E-01):b := 5.91494494492306E-01+I*(9.07589055320983E-01):c := -1.09195628344409E+00+I*(-1.29683753932459E+00):d := 9.80118443261067E-02+I*(1.04511383809784E+00):e := 5.67722713260189E-01+I*(-5.58139549851126E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.06870851243193E-01+I*(-1.49521889494481E-01):b := 2.40736868971751E-01+I*(9.50744737287198E-01):c := -8.53955076951016E-01+I*(-1.11402620901966E+00):d := 3.45641849913056E-02+I*(1.08975190644799E+00):e := 7.51286246030322E-01+I*(-3.14124914130456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.18161236772968E-01+I*(-1.98610803026916E-01):b := -5.56989985953335E-02+I*(7.58341251958744E-01):c := -7.89144433291708E-01+I*(-8.21000378676187E-01):d := -4.27323391268425E-02+I*(1.08316328137517E+00):e := 6.10110013998955E-01+I*(-1.21752822817136E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.85505863246523E-02+I*(-4.21794055436023E-01):b := -1.59107471256616E-01+I*(4.20406328447355E-01):c := -9.27849972924427E-01+I*(-5.54870090931230E-01):d := -9.77098253382795E-02+I*(1.02843085377535E+00):e := 4.69223859031074E-01+I*(-1.11037856928514E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67598305306634E-02+I*(-7.14641722514023E-01):b := -2.11025753967226E-02+I*(9.50634731923378E-02):c := -1.20516983231466E+00+I*(-4.40160665129348E-01):d := -1.04643696837975E-01+I*(9.51164534805680E-01):e := 3.84486354159018E-01+I*(-1.51361634465602E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13626883929042E-01+I*(-9.40127126195832E-01):b := 2.93741664457928E-01+I*(-6.54557760494099E-02):c := -1.49134296718680E+00+I*(-5.30545916456505E-01):d := -6.02895180898236E-02+I*(8.87518093831540E-01):e := 3.32373726848547E-01+I*(-2.06958334470315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.01714575438721E-01+I*(-9.92743140107610E-01):b := 6.38106129375382E-01+I*(1.39573214150647E-02):c := -1.65246578727403E+00+I*(-7.83733581296547E-01):d := 1.45988977281270E-02+I*(8.67272407936134E-01):e := 3.01605554679261E-01+I*(-2.75755746960469E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.73673202524787E-01+I*(-5.86408220619599E-01):b := 9.66942455074259E-01+I*(2.81659918554701E-01):c := -1.43066372470492E+00+I*(-1.17802656353633E+00):d := -1.02880439067062E-01+I*(6.57309328330200E-01):e := 3.99074130687295E-01+I*(-5.69477828843639E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.75515763596633E-01+I*(-3.11833903405356E-01):b := 9.48534082786692E-01+I*(6.34582653124903E-01):c := -1.20930123349210E+00+I*(-1.38066714255265E+00):d := -6.99380936970657E-02+I*(7.27544394377165E-01):e := 4.75450909268642E-01+I*(-8.91449038721513E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.77038722535270E-01+I*(-3.60346370844698E-02):b := 7.07578090530521E-01+I*(8.93104479171817E-01):c := -9.09472873772142E-01+I*(-1.39360976545756E+00):d := -8.98490233035786E-02+I*(8.02522507872386E-01):e := 1.22000190396678E+00+I*(-1.29305030761943E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.24320581303709E-01+I*(1.11940036464099E-01):b := 3.56820465009965E-01+I*(9.36260161138033E-01):c := -6.71471667279068E-01+I*(-1.21079843515263E+00):d := -1.53296682638380E-01+I*(8.47160576222536E-01):e := 1.60432273384068E+00+I*(-5.86147333091838E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35610966833484E-01+I*(6.28511229316643E-02):b := 6.03845974428809E-02+I*(7.43856675809578E-01):c := -6.06661023619760E-01+I*(-9.17772604809156E-01):d := -2.30593206756528E-01+I*(8.40571951149710E-01):e := 9.17703573872698E-01+I*(1.34980275300118E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.60003163851685E-02+I*(-1.60332129477443E-01):b := -4.30238752184014E-02+I*(4.05921752298189E-01):c := -7.45366563252479E-01+I*(-6.51642317064198E-01):d := -2.85570692967965E-01+I*(7.85839523549896E-01):e := 6.62903796808013E-01+I*(-2.69852596391482E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.42095605911793E-02+I*(-4.53179796555443E-01):b := 9.49810206414915E-02+I*(8.05788970431720E-02):c := -1.02268642264272E+00+I*(-5.36932891262316E-01):d := -2.92504564467660E-01+I*(7.08573204580222E-01):e := 5.43156126967444E-01+I*(-1.29401256691168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31076613989558E-01+I*(-6.78665200237252E-01):b := 4.09825260496142E-01+I*(-7.99403521985757E-02):c := -1.30885955751485E+00+I*(-6.27318142589473E-01):d := -2.48150385719509E-01+I*(6.44926763606082E-01):e := 4.70851863829846E-01+I*(-2.49436836533141E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.19164305499237E-01+I*(-7.31281214149030E-01):b := 7.54189725413596E-01+I*(-5.27254734100563E-04):c := -1.46998237760208E+00+I*(-8.80505807429516E-01):d := -1.73261969901558E-01+I*(6.24681077710676E-01):e := 4.21955037990632E-01+I*(-3.84016495711289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.18975984860617E-01+I*(-3.74900294876568E-01):b := 1.06517815483685E+00+I*(3.45181186705921E-01):c := -1.22866933484427E+00+I*(-1.13486031490326E+00):d := -9.08555115079923E-02+I*(3.50718949804822E-01):e := 9.41776720739597E-01+I*(-6.24009286022084E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.20818545932463E-01+I*(-1.00325977662325E-01):b := 1.04676978254928E+00+I*(6.98103921276123E-01):c := -1.00730684363144E+00+I*(-1.33750089391958E+00):d := -5.79131661379962E-02+I*(4.20954015851787E-01):e := 2.13475778330788E+00+I*(-1.04134781901562E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.22341504871099E-01+I*(1.75473288658561E-01):b := 8.05813790293108E-01+I*(9.56625747323036E-01):c := -7.07478483911485E-01+I*(-1.35044351682450E+00):d := -7.78240957445093E-02+I*(4.95932129347007E-01):e := 1.78432055679195E+00+I*(1.67067672995527E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69623363639538E-01+I*(3.23447962207130E-01):b := 4.55056164772553E-01+I*(9.99781429289252E-01):c := -4.69477277418412E-01+I*(-1.16763218651956E+00):d := -1.41271755079311E-01+I*(5.40570197697158E-01):e := 7.06583154153537E-01+I*(9.05102917159029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.09137491693139E-02+I*(2.74359048674695E-01):b := 1.58620297205468E-01+I*(8.07377943960797E-01):c := -4.04666633759104E-01+I*(-8.74606356176088E-01):d := -2.18568279197458E-01+I*(5.33981572624332E-01):e := 5.84968430912409E-01+I*(5.05176304486473E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08696901279002E-01+I*(5.11757962655875E-02):b := 5.52118245441859E-02+I*(4.69443020449409E-01):c := -5.43372173391823E-01+I*(-6.08476068431131E-01):d := -2.73545765408896E-01+I*(4.79249145024518E-01):e := 5.71760398945827E-01+I*(2.74642611083701E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10487657072991E-01+I*(-2.41671870812412E-01):b := 1.93216720404079E-01+I*(1.44100165194391E-01):c := -8.20692032782059E-01+I*(-4.93766642629250E-01):d := -2.80479636908591E-01+I*(4.01982826054844E-01):e := 5.88208532473659E-01+I*(9.72855261292916E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.63793963253878E-02+I*(-4.67157274494221E-01):b := 5.08060960258729E-01+I*(-1.64190840473562E-02):c := -1.10686516765419E+00+I*(-5.84151893956406E-01):d := -2.36125458160440E-01+I*(3.38336385080704E-01):e := 6.27381545522349E-01+I*(-7.57926723383196E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64467087835067E-01+I*(-5.19773288405999E-01):b := 8.52425425176184E-01+I*(6.29940134171191E-02):c := -1.26798798774143E+00+I*(-8.37339558796449E-01):d := -1.61237042342489E-01+I*(3.18090699185298E-01):e := 7.10090722595792E-01+I*(-2.88391810365066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64516366884892E-01+I*(-3.12313278453008E-01):b := 1.09960038263670E+00+I*(4.56985991829311E-01):c := -1.10167938472829E+00+I*(-9.71953558978987E-01):d := 1.15428613992760E-01+I*(1.23586568464060E-01):e := 8.91474393768154E-01+I*(7.59565594016829E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.66358927956739E-01+I*(-3.77389612387649E-02):b := 1.08119201034913E+00+I*(8.09908726399513E-01):c := -8.80316893515461E-01+I*(-1.17459413799531E+00):d := 1.48370959362756E-01+I*(1.93821634511025E-01):e := 1.03574494954685E+00+I*(5.48259915938793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.67881886895374E-01+I*(2.38060305082121E-01):b := 8.40236018092962E-01+I*(1.06843055244643E+00):c := -5.80488533795506E-01+I*(-1.18753676090022E+00):d := 1.28460029756243E-01+I*(2.68799748006245E-01):e := 5.61865858133234E-01+I*(7.19327468864695E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15163745663813E-01+I*(3.86034978630690E-01):b := 4.89478392572407E-01+I*(1.11158623441264E+00):c := -3.42487327302432E-01+I*(-1.00472543059529E+00):d := 6.50123704214414E-02+I*(3.13437816356396E-01):e := 3.72912831098064E-01+I*(5.19589030237298E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.73545868806411E-01+I*(3.36946065098255E-01):b := 1.93042525005323E-01+I*(9.19182749084188E-01):c := -2.77676683643124E-01+I*(-7.11699600251813E-01):d := -1.22841536967065E-02+I*(3.06849191283570E-01):e := 3.49289220989764E-01+I*(3.68481988807179E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.63156519254727E-01+I*(1.13762812689147E-01):b := 8.96340523440402E-02+I*(5.81247825572799E-01):c := -4.16382223275844E-01+I*(-4.45569312506856E-01):d := -6.72616399081438E-02+I*(2.52116763683756E-01):e := 3.71827475708307E-01+I*(2.62059709690570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.64947275048716E-01+I*(-1.79084854388852E-01):b := 2.27638948203933E-01+I*(2.55904970317782E-01):c := -6.93702082666079E-01+I*(-3.30859886704975E-01):d := -7.41955114078392E-02+I*(1.74850444714082E-01):e := 4.17939408931099E-01+I*(1.76490363409867E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.78080221650337E-01+I*(-4.04570258070661E-01):b := 5.42483188058584E-01+I*(9.53857210760339E-02):c := -9.79875217538213E-01+I*(-4.21245138032131E-01):d := -2.98413326596875E-02+I*(1.11204003739942E-01):e := 4.93457845564284E-01+I*(9.98707121825743E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10007469859342E-01+I*(-4.57186271982439E-01):b := 8.86847652976038E-01+I*(1.74798818540509E-01):c := -1.14099803762545E+00+I*(-6.74432802872173E-01):d := 4.50470831582626E-02+I*(9.09583178445361E-02):e := 6.28896737509079E-01+I*(3.68417665164723E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.29358831852098E-01+I*(-4.27932331910710E-01):b := 1.05410259552582E+00+I*(5.64759623035638E-01):c := -1.10911388335234E+00+I*(-7.65532177367393E-01):d := 4.19449302520708E-01+I*(8.21899498324952E-02):e := 5.47162385935247E-01+I*(9.25576294275447E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31201392923944E-01+I*(-1.53358014696467E-01):b := 1.03569422323826E+00+I*(9.17682357605841E-01):c := -8.87751392139511E-01+I*(-9.68172756383713E-01):d := 4.52391647890705E-01+I*(1.52425015879460E-01):e := 5.96856870328981E-01+I*(2.54731685202903E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32724351862580E-01+I*(1.22441251624419E-01):b := 7.94738230982083E-01+I*(1.17620418365275E+00):c := -5.87923032419556E-01+I*(-9.81115379288627E-01):d := 4.32480718284192E-01+I*(2.27403129374681E-01):e := 4.56197040644257E-01+I*(3.64636906900404E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19993789368981E-01+I*(2.70415925172988E-01):b := 4.43980605461528E-01+I*(1.21935986561897E+00):c := -3.49921825926483E-01+I*(-7.98304048983695E-01):d := 3.69033058949390E-01+I*(2.72041197724831E-01):e := 3.38055345993657E-01+I*(3.16834190799755E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.08703403839206E-01+I*(2.21327011640553E-01):b := 1.47544737894443E-01+I*(1.02695638029052E+00):c := -2.85111182267175E-01+I*(-5.05278218640219E-01):d := 2.91736534831243E-01+I*(2.65452572652006E-01):e := 2.99142328094178E-01+I*(2.42371319508605E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.98314054287521E-01+I*(-1.85624076855439E-03):b := 4.41362652331610E-02+I*(6.89021456779126E-01):c := -4.23816721899894E-01+I*(-2.39147930895262E-01):d := 2.36759048619805E-01+I*(2.10720145052191E-01):e := 2.99321117188474E-01+I*(1.79117071857078E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.00104810081510E-01+I*(-2.94703907846554E-01):b := 1.82141161093054E-01+I*(3.63678601524109E-01):c := -7.01136581290130E-01+I*(-1.24438505093380E-01):d := 2.29825177120110E-01+I*(1.33453826082518E-01):e := 3.21201259589639E-01+I*(1.26772867593503E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.13237756683132E-01+I*(-5.20189311528363E-01):b := 4.96985400947704E-01+I*(2.03159352282361E-01):c := -9.87309716162263E-01+I*(-2.14823756420537E-01):d := 2.74179355868261E-01+I*(6.98073851083775E-02):e := 3.63943735383978E-01+I*(8.36236904671998E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.25150065173452E-01+I*(-5.72805325440141E-01):b := 8.41349865865159E-01+I*(2.82572449746836E-01):c := -1.14843253624950E+00+I*(-4.68011421260579E-01):d := 3.49067771686211E-01+I*(4.95616992129714E-02):e := 4.37176596204535E-01+I*(5.80567164778794E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35362038889655E-02+I*(-6.67658015174168E-01):b := 9.49973713744968E-01+I*(6.18073600512971E-01):c := -1.24749414618498E+00+I*(-6.12183028642661E-01):d := 6.78951895100039E-01+I*(2.45899031840006E-01):e := 4.13673046148524E-01+I*(5.45412490868504E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.25378764960812E-01+I*(-3.93083697959924E-01):b := 9.31565341457402E-01+I*(9.70996335083172E-01):c := -1.02613165497215E+00+I*(-8.14823607658980E-01):d := 7.11894240470035E-01+I*(3.16134097886971E-01):e := 4.73395252955635E-01+I*(7.73531090698055E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.69017238994478E-02+I*(-1.17284431639038E-01):b := 6.90609349201230E-01+I*(1.22951816113009E+00):c := -7.26303295252196E-01+I*(-8.27766230563895E-01):d := 6.91983310863522E-01+I*(3.91112211382191E-01):e := 4.34475693021722E-01+I*(1.75834933079184E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25816417332114E-01+I*(3.06902419095304E-02):b := 3.39851723680675E-01+I*(1.27267384309630E+00):c := -4.88302088759122E-01+I*(-6.44954900258963E-01):d := 6.28535651528720E-01+I*(4.35750279732341E-01):e := 3.48070230779380E-01+I*(1.89712400892867E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.14526031802338E-01+I*(-1.83986716229043E-02):b := 4.34158561135900E-02+I*(1.08027035776785E+00):c := -4.23491445099814E-01+I*(-3.51929069915487E-01):d := 5.51239127410572E-01+I*(4.29161654659516E-01):e := 2.97562245660468E-01+I*(1.52953641230811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.04136682250653E-01+I*(-2.41581924032012E-01):b := -5.99926165476923E-02+I*(7.42335434256458E-01):c := -5.62196984732533E-01+I*(-8.57987821705297E-02):d := 4.96261641199135E-01+I*(3.74429227059702E-01):e := 2.80325371706842E-01+I*(1.08813977126482E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.05927438044643E-01+I*(-5.34429591110012E-01):b := 7.80122793122007E-02+I*(4.16992579001441E-01):c := -8.39516844122770E-01+I*(2.89106436313523E-02):d := 4.89327769699440E-01+I*(2.97162908090028E-01):e := 2.83832607108404E-01+I*(6.76377800014537E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.19060384646264E-01+I*(-7.59914994791820E-01):b := 3.92856519166851E-01+I*(2.56473329759693E-01):c := -1.12568997899490E+00+I*(-6.14746076958041E-02):d := 5.33681948447591E-01+I*(2.33516467115888E-01):e := 3.04527501754683E-01+I*(3.10130073945859E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.30972693136585E-01+I*(-8.12531008703599E-01):b := 7.37220984084305E-01+I*(3.35886427224168E-01):c := -1.28681279908214E+00+I*(-3.14662272535847E-01):d := 6.08570364265542E-01+I*(2.13270781220482E-01):e := 3.46230291521098E-01+I*(3.57397158489606E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.65640667069514E-02+I*(-9.19320016790209E-01):b := 8.35936798343016E-01+I*(5.91981721680804E-01):c := -1.45207051032150E+00+I*(-5.83659883779041E-01):d := 7.72512244612817E-01+I*(5.38112515591495E-01):e := 3.49652272528443E-01+I*(-7.48572839507448E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.98406627778797E-01+I*(-6.44745699575966E-01):b := 8.17528426055450E-01+I*(9.44904456251006E-01):c := -1.23070801910867E+00+I*(-7.86300462795361E-01):d := 8.05454589982813E-01+I*(6.08347581638461E-01):e := 4.15207002508106E-01+I*(-4.91461103343762E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.99295867174333E-02+I*(-3.68946433255079E-01):b := 5.76572433799278E-01+I*(1.20342628229792E+00):c := -9.30879659388719E-01+I*(-7.99243085700275E-01):d := 7.85543660376300E-01+I*(6.83325695133681E-01):e := 4.32901070604876E-01+I*(3.45243040466509E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52788554514128E-01+I*(-2.20971759706511E-01):b := 2.25814808278723E-01+I*(1.24658196426413E+00):c := -6.92878452895645E-01+I*(-6.16431755395343E-01):d := 7.22096001041499E-01+I*(7.27963763483831E-01):e := 3.74519958552861E-01+I*(8.72355126379269E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.41498168984353E-01+I*(-2.70060673238946E-01):b := -7.06210592883617E-02+I*(1.05417847893568E+00):c := -6.28067809236337E-01+I*(-3.23405925051867E-01):d := 6.44799476923351E-01+I*(7.21375138411006E-01):e := 3.16003459587305E-01+I*(7.95415942365238E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.31108819432668E-01+I*(-4.93243925648053E-01):b := -1.74029531949644E-01+I*(7.16243555424292E-01):c := -7.66773348869056E-01+I*(-5.72756373069099E-02):d := 5.89821990711914E-01+I*(6.66642710811191E-01):e := 2.84224143231721E-01+I*(4.87361683358018E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.32899575226657E-01+I*(-7.86091592726053E-01):b := -3.60246360897510E-02+I*(3.90900700169274E-01):c := -1.04409320825929E+00+I*(5.74337884949719E-02):d := 5.82888119212218E-01+I*(5.89376391841517E-01):e := 2.73211509183978E-01+I*(1.32537372531022E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.46032521828279E-01+I*(-1.01157699640786E+00):b := 2.78819603764900E-01+I*(2.30381450927527E-01):c := -1.33026634313143E+00+I*(-3.29514628321846E-02):d := 6.27242297960370E-01+I*(5.25729950867378E-01):e := 2.78493821806905E-01+I*(-2.23513805656365E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.57944830318600E-01+I*(-1.06419301031964E+00):b := 6.23184068682354E-01+I*(3.09794548392002E-01):c := -1.49138916321866E+00+I*(-2.86139127672227E-01):d := 7.02130713778320E-01+I*(5.05484264971971E-01):e := 3.01812464621013E-01+I*(-5.53150366912991E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.14271871679229E-01+I*(-1.06516288929109E+00):b := 7.65350989415682E-01+I*(4.98692666623642E-01):c := -1.62711942136940E+00+I*(-6.93309039257666E-01):d := 6.56352423714554E-01+I*(8.22100464448518E-01):e := 3.12619537361647E-01+I*(-1.52915213976124E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.16114432751076E-01+I*(-7.90588572076844E-01):b := 7.46942617128116E-01+I*(8.51615401193844E-01):c := -1.40575693015657E+00+I*(-8.95949618273986E-01):d := 6.89294769084550E-01+I*(8.92335530495483E-01):e := 3.79503940737843E-01+I*(-1.63683554323994E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.17637391689712E-01+I*(-5.14789305755958E-01):b := 5.05986624871943E-01+I*(1.11013722724076E+00):c := -1.10592857043662E+00+I*(-9.08892241178900E-01):d := 6.69383839478036E-01+I*(9.67313643990703E-01):e := 4.43280196270008E-01+I*(-1.02244362112597E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.49192504581507E-02+I*(-3.66814632207390E-01):b := 1.55228999351388E-01+I*(1.15329290920697E+00):c := -8.67927363943543E-01+I*(-7.26080910873969E-01):d := 6.05936180143235E-01+I*(1.01195171234085E+00):e := 4.19739947866650E-01+I*(-1.53809011518729E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.23790364012074E-01+I*(-4.15903545739824E-01):b := -1.41206868215697E-01+I*(9.60889423878519E-01):c := -8.03116720284235E-01+I*(-4.33055080530492E-01):d := 5.28639656025088E-01+I*(1.00536308726803E+00):e := 3.54062253211438E-01+I*(9.02851933027693E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.13401014460389E-01+I*(-6.39086798148932E-01):b := -2.44615340876979E-01+I*(6.22954500367130E-01):c := -9.41822259916954E-01+I*(-1.66924792785536E-01):d := 4.73662169813650E-01+I*(9.50630659668215E-01):e := 3.06095524238190E-01+I*(-8.53730632402431E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.15191770254378E-01+I*(-9.31934465226931E-01):b := -1.06610445017086E-01+I*(2.97611645112113E-01):c := -1.21914211930719E+00+I*(-5.22153669836536E-02):d := 4.66728298313955E-01+I*(8.73364340698540E-01):e := 2.80144213639804E-01+I*(-4.00395374019387E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.28324716855999E-01+I*(-1.15741986890874E+00):b := 2.08233794837564E-01+I*(1.37092395870365E-01):c := -1.50531525417932E+00+I*(-1.42600618310811E-01):d := 5.11082477062106E-01+I*(8.09717899724401E-01):e := 2.71283031447312E-01+I*(-7.65506247546177E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.97629746536789E-02+I*(-1.21003588282052E+00):b := 5.52598259755019E-01+I*(2.16505493334840E-01):c := -1.66643807426656E+00+I*(-3.95788283150852E-01):d := 5.85970892880057E-01+I*(7.89472213828994E-01):e := 2.79628496633531E-01+I*(-1.15859554587909E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.74791717306532E-01+I*(-1.03694513177066E+00):b := 7.71244171433947E-01+I*(3.81857420995091E-01):c := -1.69073354839741E+00+I*(-8.89824436615466E-01):d := 3.84824903576155E-01+I*(9.64981760966386E-01):e := 2.92037273298236E-01+I*(-2.42254381740215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.76634278378378E-01+I*(-7.62370814556418E-01):b := 7.52835799146381E-01+I*(7.34780155565293E-01):c := -1.46937105718459E+00+I*(-1.09246501563178E+00):d := 4.17767248946151E-01+I*(1.03521682701335E+00):e := 3.56222459823886E-01+I*(-2.94191216193723E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.78157237317014E-01+I*(-4.86571548235532E-01):b := 5.11879806890210E-01+I*(9.93301981612206E-01):c := -1.16954269746463E+00+I*(-1.10540763853670E+00):d := 3.97856319339639E-01+I*(1.11019494050857E+00):e := 4.72816300060746E-01+I*(-2.71971202656013E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.25439096085453E-01+I*(-3.38596874686963E-01):b := 1.61122181369654E-01+I*(1.03645766357842E+00):c := -9.31541490971560E-01+I*(-9.22596308231768E-01):d := 3.34408660004837E-01+I*(1.15483300885872E+00):e := 5.08304071415523E-01+I*(-1.41168557691400E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.67294816152282E-02+I*(-3.87685788219397E-01):b := -1.35313686197431E-01+I*(8.44054178249968E-01):c := -8.66730847312251E-01+I*(-6.29570477888292E-01):d := 2.57112135886689E-01+I*(1.14824438378590E+00):e := 4.30454018640168E-01+I*(-6.60151954521992E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52881168833087E-01+I*(-6.10869040628505E-01):b := -2.38722158858713E-01+I*(5.06119254738579E-01):c := -1.00543638694497E+00+I*(-3.63440190143335E-01):d := 2.02134649675252E-01+I*(1.09351195618608E+00):e := 3.56128933542333E-01+I*(-6.71264953114954E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.54671924627077E-01+I*(-9.03716707706505E-01):b := -1.00717262998820E-01+I*(1.80776399483562E-01):c := -1.28275624633521E+00+I*(-2.48730764341453E-01):d := 1.95200778175557E-01+I*(1.01624563721641E+00):e := 3.09335094194815E-01+I*(-9.66266499402992E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.21951287713020E-02+I*(-1.12920211138831E+00):b := 2.14126976855830E-01+I*(2.02571502418139E-02):c := -1.56892938120734E+00+I*(-3.39116015668609E-01):d := 2.39554956923708E-01+I*(9.52599196242268E-01):e := 2.83249842369125E-01+I*(-1.36947833412891E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.20282820280981E-01+I*(-1.18181812530009E+00):b := 5.58491441773284E-01+I*(9.96702477062891E-02):c := -1.73005220129457E+00+I*(-5.92303680508652E-01):d := 3.14443372741658E-01+I*(9.32353510346862E-01):e := 2.75106423851201E-01+I*(-1.85431573269742E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.11736562823305E-01+I*(-8.60377623848928E-01):b := 6.19008482917671E-01+I*(1.76207166889406E-01):c := -1.20674662590785E+00+I*(-1.30675916218710E+00):d := -1.31367041554854E-01+I*(9.79789394724988E-01):e := 1.16738796600337E-01+I*(-4.00863900734276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.13579123895151E-01+I*(-5.85803306634685E-01):b := 6.00600110630105E-01+I*(5.29129901459608E-01):c := -9.85384134695028E-01+I*(-1.50939974120342E+00):d := -9.84246961848575E-02+I*(1.05002446077195E+00):e := 7.60796315218148E-02+I*(-4.89358841943660E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.15102082833787E-01+I*(-3.10004040313799E-01):b := 3.59644118373933E-01+I*(7.87651727506521E-01):c := -6.85555774975073E-01+I*(-1.52234236410833E+00):d := -1.18335625791371E-01+I*(1.12500257426717E+00):e := 9.61246979281433E-02+I*(-6.38671748967781E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.62383941602226E-01+I*(-1.62029366765231E-01):b := 8.88649285337814E-03+I*(8.30807409472737E-01):c := -4.47554568482000E-01+I*(-1.33953103380340E+00):d := -1.81783285126172E-01+I*(1.16964064261732E+00):e := 3.15472410754330E-01+I*(-7.58270927148188E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73674327132001E-01+I*(-2.11118280297665E-01):b := -2.87549374713706E-01+I*(6.38403924144282E-01):c := -3.82743924822692E-01+I*(-1.04650520345992E+00):d := -2.59079809244320E-01+I*(1.16305201754450E+00):e := 5.17252842851972E-01+I*(-5.47932377198729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.40636766836856E-02+I*(-4.34301532706773E-01):b := -3.90957847374989E-01+I*(3.00469000632894E-01):c := -5.21449464455411E-01+I*(-7.80374915714963E-01):d := -3.14057295455757E-01+I*(1.10831958994468E+00):e := 4.36016206648644E-01+I*(-3.63556546918793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.22729208896967E-02+I*(-7.27149199784773E-01):b := -2.52952951515095E-01+I*(-2.48738546221237E-02):c := -7.98769323845647E-01+I*(-6.65665489913082E-01):d := -3.20991166955452E-01+I*(1.03105327097501E+00):e := 3.25147754434383E-01+I*(-3.14977468523821E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.69139974288075E-01+I*(-9.52634603466581E-01):b := 6.18912883395552E-02+I*(-1.85393103863872E-01):c := -1.08494245871778E+00+I*(-7.56050741240238E-01):d := -2.76636988207300E-01+I*(9.67406830000871E-01):e := 2.40053052635756E-01+I*(-3.19548924054183E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.57227665797755E-01+I*(-1.00525061737836E+00):b := 4.06255753257010E-01+I*(-1.05980006399396E-01):c := -1.24606527880502E+00+I*(-1.00923840608028E+00):d := -2.01748572389350E-01+I*(9.47161144105465E-01):e := 1.72863609058043E-01+I*(-3.48802090546169E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.29186292883821E-01+I*(-5.98915697890349E-01):b := 7.35092078955886E-01+I*(1.61722590740240E-01):c := -1.02426321623591E+00+I*(-1.40353138832006E+00):d := -3.19227909184539E-01+I*(7.37198064499531E-01):e := 4.75121136131408E-02+I*(-5.42843104106813E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.31028853955667E-01+I*(-3.24341380676105E-01):b := 7.16683706668320E-01+I*(5.14645325310442E-01):c := -8.02900725023081E-01+I*(-1.60617196733638E+00):d := -2.86285563814543E-01+I*(8.07433130546496E-01):e := -8.44575278645788E-02+I*(-6.45188173628242E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.32551812894303E-01+I*(-4.85421143552193E-02):b := 4.75727714412147E-01+I*(7.73167151357355E-01):c := -5.03072365303125E-01+I*(-1.61911459024130E+00):d := -3.06196493421056E-01+I*(8.82411244041717E-01):e := -2.32546138113078E-01+I*(-8.82447150569215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.79833671662742E-01+I*(9.94325591933492E-02):b := 1.24970088891593E-01+I*(8.16322833323570E-01):c := -2.65071158810052E-01+I*(-1.43630325993637E+00):d := -3.69644152755858E-01+I*(9.27049312391866E-01):e := -9.80683650011301E-02+I*(-1.52565180889514E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.91124057192517E-01+I*(5.03436456609150E-02):b := -1.71465778675492E-01+I*(6.23919347995116E-01):c := -2.00260515150744E-01+I*(-1.14327742959289E+00):d := -4.46940676874006E-01+I*(9.20460687319041E-01):e := 9.91653417439958E-01+I*(-1.21963588047624E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01513406744202E-01+I*(-1.72839606748193E-01):b := -2.74874251336774E-01+I*(2.85984424483727E-01):c := -3.38966054783463E-01+I*(-8.77147141847932E-01):d := -5.01918163085442E-01+I*(8.65728259719227E-01):e := 7.38257678157496E-01+I*(-5.74886837026190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.97226509502130E-02+I*(-4.65687273826192E-01):b := -1.36869355476881E-01+I*(-3.93584307712897E-02):c := -6.16285914173699E-01+I*(-7.62437716046050E-01):d := -5.08852034585138E-01+I*(7.88461940749553E-01):e := 4.69216587773232E-01+I*(-4.64252119246940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.86589704348591E-01+I*(-6.91172677508001E-01):b := 1.77974884377769E-01+I*(-1.99877680013037E-01):c := -9.02459049045833E-01+I*(-8.52822967373207E-01):d := -4.64497855836986E-01+I*(7.24815499775413E-01):e := 2.98754140556603E-01+I*(-4.59964464085515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.74677395858271E-01+I*(-7.43788691419780E-01):b := 5.22339349295224E-01+I*(-1.20464582548562E-01):c := -1.06358186913307E+00+I*(-1.10601063221325E+00):d := -3.89609440019036E-01+I*(7.04569813880007E-01):e := 1.68365802973772E-01+I*(-4.88339352023107E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.74489075219651E-01+I*(-3.87407772147318E-01):b := 8.33327778718473E-01+I*(2.25243858891459E-01):c := -8.22268826375250E-01+I*(-1.36036513968700E+00):d := -3.07202981625470E-01+I*(4.30607685974153E-01):e := 5.57054337266100E-02+I*(-8.74111209604101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.76331636291497E-01+I*(-1.12833454933075E-01):b := 8.14919406430907E-01+I*(5.78166593461661E-01):c := -6.00906335162425E-01+I*(-1.56300571870332E+00):d := -2.74260636255474E-01+I*(5.00842752021118E-01):e := -3.67956762886066E-01+I*(-1.07110435352666E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.77854595230133E-01+I*(1.62965811387812E-01):b := 5.73963414174735E-01+I*(8.36688419508575E-01):c := -3.01077975442469E-01+I*(-1.57594834160823E+00):d := -2.94171565861987E-01+I*(5.75820865516339E-01):e := -1.34809186806137E+00+I*(-1.36366843622755E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.25136453998572E-01+I*(3.10940484936380E-01):b := 2.23205788654180E-01+I*(8.79844101474790E-01):c := -6.30767689493956E-02+I*(-1.39313701130330E+00):d := -3.57619225196789E-01+I*(6.20458933866488E-01):e := -7.17501525119202E+00+I*(1.99660140839581E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.36426839528348E-01+I*(2.61851571403946E-01):b := -7.32300789129048E-02+I*(6.87440616146335E-01):c := 1.73387470991247E-03+I*(-1.10011118095982E+00):d := -4.34915749314936E-01+I*(6.13870308793663E-01):e := 2.29751732488537E+00+I*(1.42821208060915E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.31838109199680E-02+I*(3.86683189948381E-02):b := -1.76638551574187E-01+I*(3.49505692634947E-01):c := -1.36971664922807E-01+I*(-8.33980893214865E-01):d := -4.89893235526373E-01+I*(5.59137881193849E-01):e := 1.32066889657378E+00+I*(5.61459144369116E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.49745667139570E-02+I*(-2.54179348083162E-01):b := -3.86336557142938E-02+I*(2.41628373799298E-02):c := -4.14291524313043E-01+I*(-7.19271467412983E-01):d := -4.96827107026069E-01+I*(4.81871562224175E-01):e := 8.82601805460265E-01+I*(-3.36068986074567E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.31892486684421E-01+I*(-4.79664751764970E-01):b := 2.76210584140357E-01+I*(-1.36356411861818E-01):c := -7.00464659185177E-01+I*(-8.09656718740140E-01):d := -4.52472928277917E-01+I*(4.18225121250035E-01):e := 5.93374853159489E-01+I*(-5.50490308113673E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.19980178194101E-01+I*(-5.32280765676749E-01):b := 6.20575049057811E-01+I*(-5.69433143973424E-02):c := -8.61587479272412E-01+I*(-1.06284438358018E+00):d := -3.77584512459967E-01+I*(3.97979435354629E-01):e := 3.40092013165503E-01+I*(-7.14114059393354E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.20029457243926E-01+I*(-3.24820755723758E-01):b := 8.67750006518328E-01+I*(3.37048664014850E-01):c := -6.95278876259270E-01+I*(-1.19745838376272E+00):d := -1.00918856124717E-01+I*(2.03475304633391E-01):e := 8.79641329456903E-01+I*(-1.08996670661770E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.21872018315772E-01+I*(-5.02464385095145E-02):b := 8.49341634230761E-01+I*(6.89971398585052E-01):c := -4.73916385046444E-01+I*(-1.40009896277904E+00):d := -6.79765107547214E-02+I*(2.73710370680356E-01):e := 1.25143687937882E+00+I*(-3.53698190331604E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.23394977254408E-01+I*(2.25552827811371E-01):b := 6.08385641974589E-01+I*(9.48493224631965E-01):c := -1.74088025326489E-01+I*(-1.41304158568396E+00):d := -8.78874403612348E-02+I*(3.48688484175577E-01):e := 2.01241705373352E-01+I*(4.68784127543216E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.70676836022847E-01+I*(3.73527501359940E-01):b := 2.57628016454034E-01+I*(9.91648906598180E-01):c := 6.39131811665844E-02+I*(-1.23023025537902E+00):d := -1.51335099696036E-01+I*(3.93326552525727E-01):e := 5.53919200785303E-01+I*(1.39321679936389E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.18032778447378E-01+I*(3.24438587827506E-01):b := -3.88078511130506E-02+I*(7.99245421269726E-01):c := 1.28723824825893E-01+I*(-9.37204425035547E-01):d := -2.28631623814184E-01+I*(3.86737927452901E-01):e := 6.37167761441495E-01+I*(7.19606579135433E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.07643428895693E-01+I*(1.01255335418398E-01):b := -1.42216323774333E-01+I*(4.61310497758337E-01):c := -9.98171480682697E-03+I*(-6.71074137290590E-01):d := -2.83609110025621E-01+I*(3.32005499853087E-01):e := 6.81733412196473E-01+I*(3.71066325965365E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.09434184689682E-01+I*(-1.91592331659602E-01):b := -4.21142791443945E-03+I*(1.35967642503320E-01):c := -2.87301574197063E-01+I*(-5.56364711488708E-01):d := -2.90542981525316E-01+I*(2.54739180883413E-01):e := 7.15971492625203E-01+I*(1.08553928417598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.22567131291304E-01+I*(-4.17077735341410E-01):b := 3.10632811940211E-01+I*(-2.45516067384277E-02):c := -5.73474709069197E-01+I*(-6.46749962815864E-01):d := -2.46188802777165E-01+I*(1.91092739909273E-01):e := 7.50279658363958E-01+I*(-1.50158680028330E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.65520560218375E-01+I*(-4.69693749253189E-01):b := 6.54997276857666E-01+I*(5.48614907260477E-02):c := -7.34597529156432E-01+I*(-8.99937627655908E-01):d := -1.71300386959214E-01+I*(1.70847054013867E-01):e := 7.95149140292527E-01+I*(-4.82298883573172E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.84871922211131E-01+I*(-4.40439809181460E-01):b := 8.22252219407449E-01+I*(4.44822295221177E-01):c := -7.02713374883321E-01+I*(-9.91037002151127E-01):d := 2.03101832403231E-01+I*(1.62078686001826E-01):e := 8.18553823760035E-01+I*(-2.57699310343336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.86714483282977E-01+I*(-1.65865491967216E-01):b := 8.03843847119882E-01+I*(7.97745029791379E-01):c := -4.81350883670495E-01+I*(-1.19367758116745E+00):d := 2.36044177773227E-01+I*(2.32313752048791E-01):e := 1.32488019810594E+00+I*(-8.03386323236167E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.88237442221614E-01+I*(1.09933774353670E-01):b := 5.62887854863710E-01+I*(1.05626685583829E+00):c := -1.81522523950540E-01+I*(-1.20662020407236E+00):d := 2.16133248166714E-01+I*(3.07291865544012E-01):e := 1.07192077706050E+00+I*(6.67455067839271E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.44806990099476E-02+I*(2.57908447902238E-01):b := 2.12130229343155E-01+I*(1.09942253780451E+00):c := 5.64786825425341E-02+I*(-1.02380887376743E+00):d := 1.52685588831912E-01+I*(3.51929933894161E-01):e := 6.02883631069654E-01+I*(5.47155860075159E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.53190313480172E-01+I*(2.08819534369804E-01):b := -8.43056382239298E-02+I*(9.07019052476053E-01):c := 1.21289326201842E-01+I*(-7.30783043423953E-01):d := 7.53890647137647E-02+I*(3.45341308821336E-01):e := 4.83218306313861E-01+I*(3.51697374068309E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.42800963928487E-01+I*(-1.43637180393037E-02):b := -1.87714110885212E-01+I*(5.69084128964664E-01):c := -1.74162134308777E-02+I*(-4.64652755678995E-01):d := 2.04115785023277E-02+I*(2.90608881221522E-01):e := 4.60652443466492E-01+I*(2.10880782293678E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.44591719722477E-01+I*(-3.07211385117304E-01):b := -4.97092150253188E-02+I*(2.43741273709647E-01):c := -2.94736072821114E-01+I*(-3.49943329877114E-01):d := 1.34777070026323E-02+I*(2.13342562251848E-01):e := 4.73397074218586E-01+I*(9.63106638849506E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.57724666324098E-01+I*(-5.32696788799112E-01):b := 2.65135024829332E-01+I*(8.32220244678994E-02):c := -5.80909207693247E-01+I*(-4.40328581204270E-01):d := 5.78318857507841E-02+I*(1.49696121277708E-01):e := 5.13887890072975E-01+I*(-1.34261712067077E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.96369748144189E-02+I*(-5.85312802710891E-01):b := 6.09499489746786E-01+I*(1.62635121932375E-01):c := -7.42032027780483E-01+I*(-6.93516246044313E-01):d := 1.32720301568734E-01+I*(1.29450435382302E-01):e := 6.02124572761271E-01+I*(-1.33925557931700E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.90492942479984E-02+I*(-6.80165492444917E-01):b := 7.18123337626596E-01+I*(4.98136272698509E-01):c := -8.41093637715960E-01+I*(-8.37687853426394E-01):d := 4.62604424982562E-01+I*(3.25787768009336E-01):e := 5.07575784755620E-01+I*(-1.79253412158231E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.80891855319845E-01+I*(-4.05591175230674E-01):b := 6.99714965339029E-01+I*(8.51059007268711E-01):c := -6.19731146503134E-01+I*(-1.04032843244271E+00):d := 4.95546770352558E-01+I*(3.96022834056302E-01):e := 6.83456464795680E-01+I*(-1.54291721448168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.24148142584810E-02+I*(-1.29791908909788E-01):b := 4.58758973082857E-01+I*(1.10958083331562E+00):c := -3.19902786783180E-01+I*(-1.05327105534763E+00):d := 4.75635840746044E-01+I*(4.71000947551522E-01):e := 7.52129702031430E-01+I*(8.59074924939967E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.70303326973080E-01+I*(1.81827646387804E-02):b := 1.08001347562302E-01+I*(1.15273651528184E+00):c := -8.19015802901058E-02+I*(-8.70459725042696E-01):d := 4.12188181411243E-01+I*(5.15639015901672E-01):e := 5.71511161813461E-01+I*(2.05328862619306E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.59012941443305E-01+I*(-3.09061488936538E-02):b := -1.88434520004783E-01+I*(9.60333029953385E-01):c := -1.70909366307977E-02+I*(-5.77433894699220E-01):d := 3.34891657293095E-01+I*(5.09050390828847E-01):e := 4.44407999176668E-01+I*(1.59640503540749E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.48623591891620E-01+I*(-2.54089401302761E-01):b := -2.91842992666065E-01+I*(6.22398106441996E-01):c := -1.55796476263517E-01+I*(-3.11303606954263E-01):d := 2.79914171081658E-01+I*(4.54317963229032E-01):e := 3.90556624378135E-01+I*(8.86862692806333E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.50414347685609E-01+I*(-5.46937068380761E-01):b := -1.53838096806172E-01+I*(2.97055251186979E-01):c := -4.33116335653753E-01+I*(-1.96594181152381E-01):d := 2.72980299581962E-01+I*(3.77051644259358E-01):e := 3.73638739255572E-01+I*(2.01598139425700E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.63547294287231E-01+I*(-7.72422472062569E-01):b := 1.61006143048479E-01+I*(1.36536001945231E-01):c := -7.19289470525887E-01+I*(-2.86979432479537E-01):d := 3.17334478330114E-01+I*(3.13405203285218E-01):e := 3.81055012783643E-01+I*(-4.71006928028592E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.75459602777552E-01+I*(-8.25038485974348E-01):b := 5.05370607965933E-01+I*(2.15949099409707E-01):c := -8.80412290613122E-01+I*(-5.40167097319580E-01):d := 3.92222894148065E-01+I*(2.93159517389812E-01):e := 4.17362906748898E-01+I*(-1.16546690042565E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.52077157065985E-01+I*(-9.31827494060958E-01):b := 6.04086422224643E-01+I*(4.72044393866343E-01):c := -1.04567000185248E+00+I*(-8.09164708562775E-01):d := 5.56164774495339E-01+I*(6.18001251760826E-01):e := 3.56182511019100E-01+I*(-2.12731720633453E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.53919718137831E-01+I*(-6.57253176846715E-01):b := 5.85678049937077E-01+I*(8.24967128436545E-01):c := -8.24307510639658E-01+I*(-1.01180528757909E+00):d := 5.89107119865335E-01+I*(6.88236317807792E-01):e := 4.50962762886890E-01+I*(-2.45702915728487E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55442677076467E-01+I*(-3.81453910525829E-01):b := 3.44722057680905E-01+I*(1.08348895448346E+00):c := -5.24479150919703E-01+I*(-1.02474791048401E+00):d := 5.69196190258822E-01+I*(7.63214431303012E-01):e := 5.66842302951785E-01+I*(-1.62536097163878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.72754641550942E-02+I*(-2.33479236977260E-01):b := -6.03556783964938E-03+I*(1.12664463644967E+00):c := -2.86477944426629E-01+I*(-8.41936580179077E-01):d := 5.05748530924021E-01+I*(8.07852499653162E-01):e := 5.34938946163370E-01+I*(-1.73471049378227E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.85985078625319E-01+I*(-2.82568150509695E-01):b := -3.02471435406734E-01+I*(9.34241151121218E-01):c := -2.21667300767321E-01+I*(-5.48910749835600E-01):d := 4.28452006805873E-01+I*(8.01263874580336E-01):e := 4.31982242332493E-01+I*(1.84334021765040E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.75595729073634E-01+I*(-5.05751402918802E-01):b := -4.05879908068016E-01+I*(5.96306227609830E-01):c := -3.60372840400040E-01+I*(-2.82780462090643E-01):d := 3.73474520594436E-01+I*(7.46531446980522E-01):e := 3.63095288896397E-01+I*(-8.49768231659731E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.77386484867624E-01+I*(-7.98599069996802E-01):b := -2.67875012208123E-01+I*(2.70963372354813E-01):c := -6.37692699790277E-01+I*(-1.68071036288761E-01):d := 3.66540649094741E-01+I*(6.69265128010848E-01):e := 3.26654939239865E-01+I*(-5.17761397822846E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.90519431469245E-01+I*(-1.02408447367861E+00):b := 4.69692276465270E-02+I*(1.10444123113065E-01):c := -9.23865834662410E-01+I*(-2.58456287615918E-01):d := 4.10894827842893E-01+I*(6.05618687036708E-01):e := 3.12025098063629E-01+I*(-1.00710875365532E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02431739959566E-01+I*(-1.07670048759039E+00):b := 3.91333692563981E-01+I*(1.89857220577540E-01):c := -1.08498865474965E+00+I*(-5.11643952455961E-01):d := 4.85783243660843E-01+I*(5.85373001141302E-01):e := 3.18097901508996E-01+I*(-1.55018802505095E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69784962038263E-01+I*(-1.07767036656184E+00):b := 5.33500613297309E-01+I*(3.78755338809182E-01):c := -1.22071891290038E+00+I*(-9.18813864041401E-01):d := 4.40004953597077E-01+I*(9.01989200617849E-01):e := 2.61361723753608E-01+I*(-2.60969166942082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.71627523110109E-01+I*(-8.03096049347593E-01):b := 5.15092241009742E-01+I*(7.31678073379383E-01):c := -9.99356421687555E-01+I*(-1.12145444305772E+00):d := 4.72947298967073E-01+I*(9.72224266664814E-01):e := 3.10634531680944E-01+I*(-3.21068433553353E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73150482048745E-01+I*(-5.27296783026708E-01):b := 2.74136248753570E-01+I*(9.90199899426297E-01):c := -6.99528061967601E-01+I*(-1.13439706596263E+00):d := 4.53036369360560E-01+I*(1.04720238016003E+00):e := 4.23051329785283E-01+I*(-3.27893579696897E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20432340817184E-01+I*(-3.79322109478139E-01):b := -7.66213767669849E-02+I*(1.03335558139251E+00):c := -4.61526855474527E-01+I*(-9.51585735657702E-01):d := 3.89588710025758E-01+I*(1.09184044851018E+00):e := 4.92259743393161E-01+I*(-2.11861860830477E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.68277273653041E-01+I*(-4.28411023010573E-01):b := -3.73057244334070E-01+I*(8.40952096064057E-01):c := -3.96716211815219E-01+I*(-6.58559905314226E-01):d := 3.12292185907610E-01+I*(1.08525182343736E+00):e := 4.32451531728096E-01+I*(-1.15969900138521E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.57887924101356E-01+I*(-6.51594275419681E-01):b := -4.76465716995352E-01+I*(5.03017172552669E-01):c := -5.35421751447938E-01+I*(-3.92429617569268E-01):d := 2.57314699696173E-01+I*(1.03051939583754E+00):e := 3.55782650968130E-01+I*(-1.01503974881344E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.59678679895345E-01+I*(-9.44441942497681E-01):b := -3.38460821135458E-01+I*(1.77674317297651E-01):c := -8.12741610838175E-01+I*(-2.77720191767387E-01):d := 2.50380828196478E-01+I*(9.53253076867871E-01):e := 3.03023447643596E-01+I*(-1.23060623907315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.72811626496967E-01+I*(-1.16992734617949E+00):b := -2.36165812808081E-02+I*(1.71550680559039E-02):c := -1.09891474571031E+00+I*(-3.68105443094543E-01):d := 2.94735006944630E-01+I*(8.89606635893731E-01):e := 2.70520666226849E-01+I*(-1.58819394325334E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15276065012712E-01+I*(-1.22254336009127E+00):b := 3.20747883636646E-01+I*(9.65681655203792E-02):c := -1.26003756579754E+00+I*(-6.21293107934586E-01):d := 3.69623422762580E-01+I*(8.69360949998325E-01):e := 2.54875460491307E-01+I*(-2.04494946408180E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.30304807665566E-01+I*(-1.04945260904141E+00):b := 5.39393795315575E-01+I*(2.61920093180630E-01):c := -1.28433303992840E+00+I*(-1.11532926139920E+00):d := 1.68477433458677E-01+I*(1.04487049713572E+00):e := 1.86691168458635E-01+I*(-3.19534098477605E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.32147368737411E-01+I*(-7.74878291827166E-01):b := 5.20985423028008E-01+I*(6.14842827750832E-01):c := -1.06297054871557E+00+I*(-1.31796984041552E+00):d := 2.01419778828673E-01+I*(1.11510556318268E+00):e := 1.95900245459154E-01+I*(-3.95988984911203E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.33670327676048E-01+I*(-4.99079025506280E-01):b := 2.80029430771836E-01+I*(8.73364653797745E-01):c := -7.63142188995617E-01+I*(-1.33091246332043E+00):d := 1.81508849222160E-01+I*(1.19008367667790E+00):e := 2.79837971745816E-01+I*(-4.73895134650224E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.80952186444487E-01+I*(-3.51104351957712E-01):b := -7.07281947487189E-02+I*(9.16520335763960E-01):c := -5.25140982502544E-01+I*(-1.14810113301550E+00):d := 1.18061189887359E-01+I*(1.23472174502805E+00):e := 4.31876440403825E-01+I*(-4.30593221900358E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.22425719742619E-02+I*(-4.00193265490146E-01):b := -3.67164062315804E-01+I*(7.24116850435506E-01):c := -4.60330338843235E-01+I*(-8.55075302672026E-01):d := 4.07646657692107E-02+I*(1.22813311995523E+00):e := 4.49244640733376E-01+I*(-2.79595399113336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.73680784740535E-02+I*(-6.23376517899254E-01):b := -4.70572534977086E-01+I*(3.86181926924118E-01):c := -5.99035878475955E-01+I*(-5.88945014927069E-01):d := -1.42128204422264E-02+I*(1.17340069235541E+00):e := 3.69585600659774E-01+I*(-2.09791200218407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.91588342680422E-02+I*(-9.16224184977254E-01):b := -3.32567639117193E-01+I*(6.08390716690999E-02):c := -8.76355737866191E-01+I*(-4.74235589125187E-01):d := -2.11466919419216E-02+I*(1.09613437338574E+00):e := 2.97454871845859E-01+I*(-2.04886600977527E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.77082191303357E-02+I*(-1.14170958865906E+00):b := -1.77233992625425E-02+I*(-9.96801775726477E-02):c := -1.16252887273832E+00+I*(-5.64620840452343E-01):d := 2.32074868062300E-02+I*(1.03248793241160E+00):e := 2.45098493435850E-01+I*(-2.26989637216438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.75795910640015E-01+I*(-1.19432560257084E+00):b := 3.26641065654912E-01+I*(-2.02670801081726E-02):c := -1.32365169282556E+00+I*(-8.17808505292386E-01):d := 9.80959026241799E-02+I*(1.01224224651619E+00):e := 2.08020449318137E-01+I*(-2.64845066805056E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.62301708631278E-01+I*(-8.34275780651427E-01):b := 5.18495018915196E-01+I*(-6.47007056754558E-02):c := -7.50474067418920E-01+I*(-1.21827666869500E+00):d := -3.48450308584359E-01+I*(9.01922243956760E-01):e := -4.53960363566317E-02+I*(-4.16951650799725E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.64144269703124E-01+I*(-5.59701463437184E-01):b := 5.00086646627630E-01+I*(2.88222028894746E-01):c := -5.29111576206094E-01+I*(-1.42091724771132E+00):d := -3.15507963214363E-01+I*(9.72157310003725E-01):e := -1.32821106153721E-01+I*(-4.44339010550389E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.65667228641760E-01+I*(-2.83902197116298E-01):b := 2.59130654371458E-01+I*(5.46743854941660E-01):c := -2.29283216486139E-01+I*(-1.43385987061623E+00):d := -3.35418892820876E-01+I*(1.04713542349894E+00):e := -2.28490225453762E-01+I*(-5.24848639021722E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.12949087410199E-01+I*(-1.35927523567729E-01):b := -9.16269711490971E-02+I*(5.89899536907875E-01):c := 8.71799000693462E-03+I*(-1.25104854031130E+00):d := -3.98866552155677E-01+I*(1.09177349184909E+00):e := -2.80617625681673E-01+I*(-7.28868849647607E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.24239472939974E-01+I*(-1.85016437100164E-01):b := -3.88062838716182E-01+I*(3.97496051579420E-01):c := 7.35286336662430E-02+I*(-9.58022709967825E-01):d := -4.76163076273825E-01+I*(1.08518486677627E+00):e := -1.55992854276595E-02+I*(-9.65263094376363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.34628822491659E-01+I*(-4.08199689509271E-01):b := -4.91471311377464E-01+I*(5.95611280680319E-02):c := -6.51769059664763E-02+I*(-6.91892422222868E-01):d := -5.31140562485262E-01+I*(1.03045243917646E+00):e := 2.62807231414538E-01+I*(-7.41002136669894E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32838066697670E-01+I*(-7.01047356587271E-01):b := -3.53466415517571E-01+I*(-2.65781727186985E-01):c := -3.42496765356712E-01+I*(-5.77182996420987E-01):d := -5.38074433984957E-01+I*(9.53186120206781E-01):e := 2.18263648221517E-01+I*(-5.32571071262761E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.19705120096048E-01+I*(-9.26532760269080E-01):b := -3.86221756629207E-02+I*(-4.26300976428733E-01):c := -6.28669900228846E-01+I*(-6.67568247748143E-01):d := -4.93720255236805E-01+I*(8.89539679232641E-01):e := 1.24462208939269E-01+I*(-4.48268104357775E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.07792811605727E-01+I*(-9.79148774180859E-01):b := 3.05742289254534E-01+I*(-3.46887878964258E-01):c := -7.89792720316082E-01+I*(-9.20755912588186E-01):d := -4.18831839418855E-01+I*(8.69293993337235E-01):e := 3.75325082987870E-02+I*(-4.18159825093770E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.79751438691794E-01+I*(-5.72813854692847E-01):b := 6.34578614953410E-01+I*(-7.91852818246217E-02):c := -5.67990657746972E-01+I*(-1.31504889482797E+00):d := -5.36311176214044E-01+I*(6.59330913731302E-01):e := -1.83015068501286E-01+I*(-4.52644998969013E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.81593999763640E-01+I*(-2.98239537478604E-01):b := 6.16170242665845E-01+I*(2.73737452745580E-01):c := -3.46628166534146E-01+I*(-1.51768947384429E+00):d := -5.03368830844048E-01+I*(7.29565979778267E-01):e := -2.95621962833664E-01+I*(-4.18168697775646E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.83116958702277E-01+I*(-2.24402711577175E-02):b := 3.75214250409672E-01+I*(5.32259278792494E-01):c := -4.67998068141907E-02+I*(-1.53063209674920E+00):d := -5.23279760450562E-01+I*(8.04544093273487E-01):e := -4.41409020464912E-01+I*(-4.13364938827421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.30398817470716E-01+I*(1.25534402390851E-01):b := 2.44566248891172E-02+I*(5.75414960758709E-01):c := 1.91201399678883E-01+I*(-1.34782076644427E+00):d := -5.86727419785363E-01+I*(8.49182161623637E-01):e := -6.62509342123696E-01+I*(-4.94254968198811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41689203000490E-01+I*(7.64454888584168E-02):b := -2.71979242677968E-01+I*(3.83011475430254E-01):c := 2.56012043338191E-01+I*(-1.05479493610079E+00):d := -6.64023943903511E-01+I*(8.42593536550812E-01):e := -8.83958093006505E-01+I*(-9.47540225532360E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.52078552552175E-01+I*(-1.46737763550691E-01):b := -3.75387715339250E-01+I*(4.50765519188659E-02):c := 1.17306503705472E-01+I*(-7.88664648355837E-01):d := -7.19001430114948E-01+I*(7.87861108950997E-01):e := -1.57662574618729E-01+I*(-1.35663011762023E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.50287796758186E-01+I*(-4.39585430628691E-01):b := -2.37382819479357E-01+I*(-2.80266303336151E-01):c := -1.60013355684764E-01+I*(-6.73955222553956E-01):d := -7.25935301614643E-01+I*(7.10594789981324E-01):e := 1.13606107584450E-01+I*(-8.65194437656547E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.37154850156564E-01+I*(-6.65070834310500E-01):b := 7.74614203752938E-02+I*(-4.40785552577899E-01):c := -4.46186490556898E-01+I*(-7.64340473881112E-01):d := -6.81581122866491E-01+I*(6.46948349007184E-01):e := 2.55065986731049E-02+I*(-6.24073798065277E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.25242541666244E-01+I*(-7.17686848222278E-01):b := 4.21825885292748E-01+I*(-3.61372455113424E-01):c := -6.07309310644133E-01+I*(-1.01752813872115E+00):d := -6.06692707048541E-01+I*(6.26702663111777E-01):e := -8.01706850829625E-02+I*(-5.13557458436190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.25054221027624E-01+I*(-3.61305928949816E-01):b := 7.32814314715998E-01+I*(-1.56640136734021E-02):c := -3.65996267886315E-01+I*(-1.27188264619490E+00):d := -5.24286248654975E-01+I*(3.52740535205923E-01):e := -3.89491901092882E-01+I*(-5.51153425641027E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.26896782099470E-01+I*(-8.67316117355728E-02):b := 7.14405942428432E-01+I*(3.37258720896800E-01):c := -1.44633776673490E-01+I*(-1.47452322521122E+00):d := -4.91343903284979E-01+I*(4.22975601252888E-01):e := -5.29092514413682E-01+I*(-3.94544557142774E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.28419741038106E-01+I*(1.89067654585313E-01):b := 4.73449950172259E-01+I*(5.95780546943713E-01):c := 1.55194583046466E-01+I*(-1.48746584811614E+00):d := -5.11254832891492E-01+I*(4.97953714748109E-01):e := -6.92040846559441E-01+I*(-2.36071540065547E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.75701599806545E-01+I*(3.37042328133882E-01):b := 1.22692324651704E-01+I*(6.38936228909929E-01):c := 3.93195789539539E-01+I*(-1.30465451781120E+00):d := -5.74702492226294E-01+I*(5.42591783098259E-01):e := -9.44965280747774E-01+I*(-3.09990645428492E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.86991985336321E-01+I*(2.87953414601447E-01):b := -1.73743542915380E-01+I*(4.46532743581474E-01):c := 4.58006433198847E-01+I*(-1.01162868746773E+00):d := -6.51999016344442E-01+I*(5.36003158025434E-01):e := -1.56481532983793E+00+I*(3.17345114242354E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.61866511199496E-03+I*(6.47701621923397E-02):b := -2.77152015576663E-01+I*(1.08597820070085E-01):c := 3.19300893566128E-01+I*(-7.45498399722770E-01):d := -7.06976502555879E-01+I*(4.81270730425619E-01):e := -5.53830599273867E+00+I*(-1.24157561116881E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.40942090598388E-03+I*(-2.28077504885660E-01):b := -1.39147119716769E-01+I*(-2.16745035184932E-01):c := 4.19810341758920E-02+I*(-6.30788973920888E-01):d := -7.13910374055574E-01+I*(4.04004411455945E-01):e := 3.02863920261534E-01+I*(-2.19299493555870E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.82457632492395E-01+I*(-4.53562908567469E-01):b := 1.75697120137881E-01+I*(-3.77264284426680E-01):c := -2.44192100696242E-01+I*(-7.21174225248045E-01):d := -6.69556195307422E-01+I*(3.40357970481806E-01):e := -2.65142986738918E-02+I*(-1.09711924045462E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.70545324002074E-01+I*(-5.06178922479247E-01):b := 5.20061585055336E-01+I*(-2.97851186962204E-01):c := -4.05314920783477E-01+I*(-9.74361890088088E-01):d := -5.94667779489472E-01+I*(3.20112284586399E-01):e := -2.37592484675348E-01+I*(-7.49703308248901E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.70594603051899E-01+I*(-2.98718912526256E-01):b := 7.67236542515852E-01+I*(9.61407914499884E-02):c := -2.39006317770335E-01+I*(-1.10897589027063E+00):d := -3.18002123154223E-01+I*(1.25608153865161E-01):e := -7.70675492107631E-01+I*(-1.00686347370406E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.72437164123745E-01+I*(-2.41445953120127E-02):b := 7.48828170228286E-01+I*(4.49063526020190E-01):c := -1.76438265575091E-02+I*(-1.31161646928695E+00):d := -2.85059777784227E-01+I*(1.95843219912126E-01):e := -1.03906421878445E+00+I*(-3.98789492691120E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.73960123062381E-01+I*(2.51654671008873E-01):b := 5.07872177972113E-01+I*(7.07585352067104E-01):c := 2.82184533162446E-01+I*(-1.32455909219186E+00):d := -3.04970707390740E-01+I*(2.70821333407347E-01):e := -1.06311220308771E+00+I*(1.64629393535808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21241981830820E-01+I*(3.99629344557442E-01):b := 1.57114552451559E-01+I*(7.50741034033319E-01):c := 5.20185739655519E-01+I*(-1.14174776188693E+00):d := -3.68418366725542E-01+I*(3.15459401757497E-01):e := -8.89766145504184E-01+I*(7.17109140902544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.74676326394048E-02+I*(3.50540431025007E-01):b := -1.39321315115526E-01+I*(5.58337548704864E-01):c := 5.84996383314827E-01+I*(-8.48721931543452E-01):d := -4.45714890843689E-01+I*(3.08870776684672E-01):e := -4.26343300830882E-01+I*(1.26859543732737E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.57078283087720E-01+I*(1.27357178615899E-01):b := -2.42729787776808E-01+I*(2.20402625193476E-01):c := 4.46290843682108E-01+I*(-5.82591643798495E-01):d := -5.00692377055127E-01+I*(2.54138349084857E-01):e := 6.01589447890702E-01+I*(1.60909025660354E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.58869038881709E-01+I*(-1.65490488462100E-01):b := -1.04724891916915E-01+I*(-1.04940230061541E-01):c := 1.68970984291872E-01+I*(-4.67882217996613E-01):d := -5.07626248554822E-01+I*(1.76872030115183E-01):e := 2.08312487932169E+00+I*(6.49032128877182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.20019854833307E-02+I*(-3.90975892143909E-01):b := 2.10119347937736E-01+I*(-2.65459479303289E-01):c := -1.17202150580262E-01+I*(-5.58267469323769E-01):d := -4.63272069806670E-01+I*(1.13225589141043E-01):e := 1.52368829680086E+00+I*(-1.40907972726356E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.16085706026349E-01+I*(-4.43591906055687E-01):b := 5.54483812855190E-01+I*(-1.86046381838814E-01):c := -2.78324970667497E-01+I*(-8.11455134163812E-01):d := -3.88383653988720E-01+I*(9.29799032456372E-02):e := -2.11855843859607E-02+I*(-1.59124933774984E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35437068019104E-01+I*(-4.14337965983958E-01):b := 7.21738755404973E-01+I*(2.03914422656315E-01):c := -2.46440816394386E-01+I*(-9.02554508659032E-01):d := -1.39814346262743E-02+I*(8.42115352335964E-02):e := 8.72242627598444E-01+I*(-1.99648359460280E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.37279629090950E-01+I*(-1.39763648769714E-01):b := 7.03330383117407E-01+I*(5.56837157226517E-01):c := -2.50783251815598E-02+I*(-1.10519508767535E+00):d := 1.89609107437217E-02+I*(1.54446601280561E-01):e := -3.95783317530008E+00+I*(-2.61882603922828E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.38802588029587E-01+I*(1.36035617551171E-01):b := 4.62374390861235E-01+I*(8.15358983273430E-01):c := 2.74750034538395E-01+I*(-1.11813771058027E+00):d := -9.50018862791429E-04+I*(2.29424714775782E-01):e := -1.37120688219932E+00+I*(1.86728973864687E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.39155532019747E-02+I*(2.84010291099740E-01):b := 1.11616765340679E-01+I*(8.58514665239646E-01):c := 5.12751241031469E-01+I*(-9.35326380275334E-01):d := -6.43976781975928E-02+I*(2.74062783125932E-01):e := -3.19479721850656E-02+I*(1.32410434060687E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02625167672200E-01+I*(2.34921377567305E-01):b := -1.84819102226406E-01+I*(6.66111179911192E-01):c := 5.77561884690777E-01+I*(-6.42300549931857E-01):d := -1.41694202315741E-01+I*(2.67474158053107E-01):e := 4.18391181502737E-01+I*(8.99559672330167E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.92235818120515E-01+I*(1.17381251581978E-02):b := -2.88227574887687E-01+I*(3.28176256399803E-01):c := 4.38856345058057E-01+I*(-3.76170262186900E-01):d := -1.96671688527178E-01+I*(2.12741730453292E-01):e := 6.59029713063171E-01+I*(5.70817296230743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.94026573914504E-01+I*(-2.81109541919802E-01):b := -1.50222679027794E-01+I*(2.83340114478572E-03):c := 1.61536485667821E-01+I*(-2.61460836385019E-01):d := -2.03605560026873E-01+I*(1.35475411483619E-01):e := 8.28531993318831E-01+I*(2.57439284353184E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.07159520516125E-01+I*(-5.06594945601611E-01):b := 1.64621560826856E-01+I*(-1.57685848096962E-01):c := -1.24636649204312E-01+I*(-3.51846087712175E-01):d := -1.59251381278721E-01+I*(7.18289705094786E-02):e := 9.69566895868784E-01+I*(-1.15828448720800E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.90718290064458E-02+I*(-5.59210959513389E-01):b := 5.08986025744311E-01+I*(-7.82727506324869E-02):c := -2.85759469291548E-01+I*(-6.05033752552218E-01):d := -8.43629654607711E-02+I*(5.15832846140725E-02):e := 1.07806954988711E+00+I*(-6.95916384386035E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.29614440055972E-01+I*(-6.54063649247416E-01):b := 6.17609873624120E-01+I*(2.57228400133647E-01):c := -3.84821079227025E-01+I*(-7.49205359934299E-01):d := 2.45521157953056E-01+I*(2.47920617241107E-01):e := 7.13988079584075E-01+I*(-5.97310867905798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31457001127818E-01+I*(-3.79489332033172E-01):b := 5.99201501336554E-01+I*(6.10151134703850E-01):c := -1.63458588014200E-01+I*(-9.51845938950619E-01):d := 2.78463503323052E-01+I*(3.18155683288072E-01):e := 1.27626797418236E+00+I*(-1.05784594941367E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32979960066454E-01+I*(-1.03690065712286E-01):b := 3.58245509080381E-01+I*(8.68672960750763E-01):c := 1.36369771705755E-01+I*(-9.64788561855533E-01):d := 2.58552573716539E-01+I*(3.93133796783293E-01):e := 2.49371538764318E+00+I*(5.13610645495828E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19738181165107E-01+I*(4.42846078362825E-02):b := 7.48788355982591E-03+I*(9.11828642716978E-01):c := 3.74370978198829E-01+I*(-7.81977231550601E-01):d := 1.95104914381737E-01+I*(4.37771865133443E-01):e := 9.98127378356411E-01+I*(7.80084765388224E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.08447795635331E-01+I*(-4.80430569615193E-03):b := -2.88947984007258E-01+I*(7.19425157388523E-01):c := 4.39181621858137E-01+I*(-4.88951401207125E-01):d := 1.17808390263589E-01+I*(4.31183240060617E-01):e := 6.86761696936169E-01+I*(4.15988931051586E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.98058446083647E-01+I*(-2.27987558105260E-01):b := -3.92356456668540E-01+I*(3.81490233877135E-01):c := 3.00476082225418E-01+I*(-2.22821113462168E-01):d := 6.28309040521523E-02+I*(3.76450812460803E-01):e := 6.01884972378891E-01+I*(1.92581780506575E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.99849201877636E-01+I*(-5.20835225183259E-01):b := -2.54351560808647E-01+I*(5.61473786221175E-02):c := 2.31562228351819E-02+I*(-1.08111687660286E-01):d := 5.58970325524570E-02+I*(2.99184493491129E-01):e := 5.73409598890084E-01+I*(2.41477290015457E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.12982148479258E-01+I*(-7.46320628865068E-01):b := 6.04926790460031E-02+I*(-1.04371870619630E-01):c := -2.63016912036952E-01+I*(-1.98496938987442E-01):d := 1.00251211300609E-01+I*(2.35538052516989E-01):e := 5.71779981029719E-01+I*(-1.34631511693065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.24894456969579E-01+I*(-7.98936642776847E-01):b := 4.04857143963458E-01+I*(-2.49587731551549E-02):c := -4.24139732124187E-01+I*(-4.51684603827485E-01):d := 1.75139627118559E-01+I*(2.15292366621583E-01):e := 6.00950556551717E-01+I*(-3.20839549658134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.02642302873957E-01+I*(-9.05725650863457E-01):b := 5.03572958222168E-01+I*(2.31136521301481E-01):c := -5.89397443363549E-01+I*(-7.20682215070679E-01):d := 3.39081507465835E-01+I*(5.40134100992597E-01):e := 3.79207186701156E-01+I*(-4.34010510442806E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.04484863945804E-01+I*(-6.31151333649214E-01):b := 4.85164585934602E-01+I*(5.84059255871683E-01):c := -3.68034952150723E-01+I*(-9.23322794086999E-01):d := 3.72023852835830E-01+I*(6.10369167039562E-01):e := 4.83898220534570E-01+I*(-6.20098275473112E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.06007822884440E-01+I*(-3.55352067328328E-01):b := 2.44208593678430E-01+I*(8.42581081918596E-01):c := -6.82065924307681E-02+I*(-9.36265416991914E-01):d := 3.52112923229317E-01+I*(6.85347280534782E-01):e := 8.97166844158391E-01+I*(-6.87319745509807E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.67103183471212E-02+I*(-2.07377393779759E-01):b := -1.06549031842125E-01+I*(8.85736763884811E-01):c := 1.69794614062306E-01+I*(-7.53454086686981E-01):d := 2.88665263894516E-01+I*(7.29985348884932E-01):e := 1.04385309089843E+00+I*(-1.45781401338900E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.35419932817346E-01+I*(-2.56466307312193E-01):b := -4.02984899409210E-01+I*(6.93333278556357E-01):c := 2.34605257721614E-01+I*(-4.60428256343505E-01):d := 2.11368739776368E-01+I*(7.23396723812107E-01):e := 7.22794050330390E-01+I*(1.45963221085371E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.25030583265661E-01+I*(-4.79649559721301E-01):b := -5.06393372070492E-01+I*(3.55398355044969E-01):c := 9.58997180888944E-02+I*(-1.94297968598548E-01):d := 1.56391253564931E-01+I*(6.68664296212293E-01):e := 5.45005203802943E-01+I*(-4.03469185931235E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.26821339059650E-01+I*(-7.72497226799301E-01):b := -3.68388476210599E-01+I*(3.00554997899514E-02):c := -1.81420141301342E-01+I*(-7.95885427966664E-02):d := 1.49457382065236E-01+I*(5.91397977242619E-01):e := 4.54064931432070E-01+I*(-1.19995665397850E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.39954285661272E-01+I*(-9.97982630481110E-01):b := -5.35442363559487E-02+I*(-1.30463749451796E-01):c := -4.67593276173475E-01+I*(-1.69973794123823E-01):d := 1.93811560813388E-01+I*(5.27751536268479E-01):e := 4.01805602457152E-01+I*(-2.04997460917466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.18665941515926E-02+I*(-1.05059864439289E+00):b := 2.90820228561506E-01+I*(-5.10506519873210E-02):c := -6.28716096260711E-01+I*(-4.23161458963866E-01):d := 2.68699976631338E-01+I*(5.07505850373073E-01):e := 3.73882507918403E-01+I*(-3.03412406364488E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.20350107846235E-01+I*(-1.05156852336434E+00):b := 4.32987149294833E-01+I*(1.37847466244320E-01):c := -7.64446354411447E-01+I*(-8.30331370549305E-01):d := 2.22921686567572E-01+I*(8.24122049849620E-01):e := 2.01190592404495E-01+I*(-4.03878841736782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.22192668918082E-01+I*(-7.76994206150092E-01):b := 4.14578777007267E-01+I*(4.90770200814522E-01):c := -5.43083863198621E-01+I*(-1.03297194956562E+00):d := 2.55864031937567E-01+I*(8.94357115896585E-01):e := 1.95512862310997E-01+I*(-5.22256748818457E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.23715627856718E-01+I*(-5.01194939829206E-01):b := 1.73622784751095E-01+I*(7.49292026861435E-01):c := -2.43255503478666E-01+I*(-1.04591457247054E+00):d := 2.35953102331054E-01+I*(9.69335229391805E-01):e := 3.08729564579433E-01+I*(-6.83443515814023E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.70997486625157E-01+I*(-3.53220266280638E-01):b := -1.77134840769461E-01+I*(7.92447708827650E-01):c := -5.25429698559185E-03+I*(-8.63103242165607E-01):d := 1.72505442996253E-01+I*(1.01397329774196E+00):e := 6.18312655186033E-01+I*(-6.35710067533469E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.17712127845068E-01+I*(-4.02309179813072E-01):b := -4.73570708336545E-01+I*(6.00044223499196E-01):c := 5.95563466737163E-02+I*(-5.70077411822131E-01):d := 9.52089188781049E-02+I*(1.00738467266913E+00):e := 6.36018254295645E-01+I*(-3.35817576369720E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.07322778293383E-01+I*(-6.25492432222179E-01):b := -5.76979180997827E-01+I*(2.62109299987807E-01):c := -7.91491929590033E-02+I*(-3.03947124077174E-01):d := 4.02314326666677E-02+I*(9.52652245069315E-01):e := 4.84007004510905E-01+I*(-2.35199484281980E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.09113534087372E-01+I*(-9.18340099300179E-01):b := -4.38974285137934E-01+I*(-6.32335552672099E-02):c := -3.56469052349239E-01+I*(-1.89237698275292E-01):d := 3.32975611669725E-02+I*(8.75385926099641E-01):e := 3.72047936160016E-01+I*(-2.38472057278913E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.22246480688994E-01+I*(-1.14382550298199E+00):b := -1.24130045283284E-01+I*(-2.23752804508958E-01):c := -6.42642187221373E-01+I*(-2.79622949602448E-01):d := 7.76517399151244E-02+I*(8.11739485125502E-01):e := 2.95903636402195E-01+I*(-2.73694730759965E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.65841210820685E-01+I*(-1.19644151689377E+00):b := 2.20234419634171E-01+I*(-1.44339707044482E-01):c := -8.03765007308608E-01+I*(-5.32810614442491E-01):d := 1.52540155733075E-01+I*(7.91493799230096E-01):e := 2.40291354454527E-01+I*(-3.27009873114195E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.80869953473538E-01+I*(-1.02335076584391E+00):b := 4.38880331313099E-01+I*(2.10122206157682E-02):c := -8.28060481439462E-01+I*(-1.02684676790710E+00):d := -4.86058335708279E-02+I*(9.67003346367487E-01):e := 7.29588300864818E-02+I*(-4.02793680125934E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.82712514545384E-01+I*(-7.48776448629665E-01):b := 4.20471959025533E-01+I*(3.73934955185970E-01):c := -6.06697990226637E-01+I*(-1.22948734692342E+00):d := -1.56634882008322E-02+I*(1.03723841241445E+00):e := 1.72021030707495E-02+I*(-4.75688573735897E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.84235473484021E-01+I*(-4.72977182308779E-01):b := 1.79515966769361E-01+I*(6.32456781232884E-01):c := -3.06869630506682E-01+I*(-1.24242996982834E+00):d := -3.55744178073451E-02+I*(1.11221652590967E+00):e := -1.43631114149841E-03+I*(-6.11515212766574E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.31517332252459E-01+I*(-3.25002508760210E-01):b := -1.71241658751195E-01+I*(6.75612463199099E-01):c := -6.88684240136083E-02+I*(-1.05961863952341E+00):d := -9.90220771421466E-02+I*(1.15685459425982E+00):e := 1.49306395300469E-01+I*(-7.85689321719927E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42807717782234E-01+I*(-3.74091422292645E-01):b := -4.67677526318279E-01+I*(4.83208977870644E-01):c := -4.05778035430027E-03+I*(-7.66592809179930E-01):d := -1.76318601260294E-01+I*(1.15026596918700E+00):e := 4.22624604599156E-01+I*(-6.67755452831650E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.68029326660806E-02+I*(-5.97274674701752E-01):b := -5.71085998979562E-01+I*(1.45274054359256E-01):c := -1.42763319987020E-01+I*(-5.00462521434973E-01):d := -2.31296087471732E-01+I*(1.09553354158718E+00):e := 4.03862859644280E-01+I*(-4.44895285249526E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.85936884600695E-02+I*(-8.90122341779752E-01):b := -4.33081103119668E-01+I*(-1.80068800895761E-01):c := -4.20083179377256E-01+I*(-3.85753095633092E-01):d := -2.38229958971427E-01+I*(1.01826722261751E+00):e := 2.99035574095367E-01+I*(-3.62908893010500E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.38273364938309E-01+I*(-1.11560774546156E+00):b := -1.18236863265018E-01+I*(-3.40588050137509E-01):c := -7.06256314249390E-01+I*(-4.76138346960248E-01):d := -1.93875780223275E-01+I*(9.54620781643369E-01):e := 2.10061897957693E-01+I*(-3.48524699163837E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.26361056447988E-01+I*(-1.16822375937334E+00):b := 2.26127601652436E-01+I*(-2.61174952673034E-01):c := -8.67379134336625E-01+I*(-7.29326011800291E-01):d := -1.18987364405325E-01+I*(9.34375095747963E-01):e := 1.37132201917775E-01+I*(-3.63989104397896E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.84258916195641E-01+I*(-7.81777959507460E-01):b := 5.96349833918097E-01+I*(-3.13855652024848E-01):c := -4.57824459931680E-01+I*(-8.57208799005405E-01):d := -4.64693699271013E-01+I*(7.02734111492409E-01):e := -2.32059846233105E-01+I*(-4.18284202823070E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.86101477267488E-01+I*(-5.07203642293217E-01):b := 5.77941461630531E-01+I*(3.90670825453537E-02):c := -2.36461968718855E-01+I*(-1.05984937802172E+00):d := -4.31751353901017E-01+I*(7.72969177539374E-01):e := -3.26385748160953E-01+I*(-3.62040902644874E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.87624436206124E-01+I*(-2.31404375972331E-01):b := 3.36985469374358E-01+I*(2.97588908592267E-01):c := 6.33663910011005E-02+I*(-1.07279200092664E+00):d := -4.51662283507530E-01+I*(8.47947291034594E-01):e := -4.49272064795733E-01+I*(-3.27514199075183E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.34906294974563E-01+I*(-8.34297024237622E-02):b := -1.37721561461964E-02+I*(3.40744590558482E-01):c := 3.01367597494174E-01+I*(-8.89980670621707E-01):d := -5.15109942842332E-01+I*(8.92585359384744E-01):e := -6.38397850512093E-01+I*(-3.42606865723061E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46196680504338E-01+I*(-1.32518615956196E-01):b := -3.10208023713281E-01+I*(1.48341105230028E-01):c := 3.66178241153482E-01+I*(-5.96954840278231E-01):d := -5.92406466960480E-01+I*(8.85996734311919E-01):e := -9.19122875576036E-01+I*(-5.86907435711988E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.56586030056023E-01+I*(-3.55701868365304E-01):b := -4.13616496374563E-01+I*(-1.89593818281361E-01):c := 2.27472701520763E-01+I*(-3.30824552533273E-01):d := -6.47383953171917E-01+I*(8.31264306712105E-01):e := -6.12256547872314E-01+I*(-1.21449954803977E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.54795274262034E-01+I*(-6.48549535443303E-01):b := -2.75611600514670E-01+I*(-5.14936673536378E-01):c := -4.98471578694730E-02+I*(-2.16115126731392E-01):d := -6.54317824671612E-01+I*(7.53997987742431E-01):e := -8.49652747994072E-02+I*(-9.30810256541967E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41662327660412E-01+I*(-8.74034939125113E-01):b := 3.92326393399802E-02+I*(-6.75455922778126E-01):c := -3.36020292741607E-01+I*(-3.06500378058548E-01):d := -6.09963645923460E-01+I*(6.90351546768291E-01):e := -7.63857927606097E-02+I*(-6.45002526979284E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.29750019170091E-01+I*(-9.26650953036891E-01):b := 3.83597104257435E-01+I*(-5.96042825313650E-01):c := -4.97143112828842E-01+I*(-5.59688042898591E-01):d := -5.35075230105510E-01+I*(6.70105860872885E-01):e := -1.49049638736746E-01+I*(-5.02175062701841E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.01708646256158E-01+I*(-5.20316033548880E-01):b := 7.12433429956312E-01+I*(-3.28340228174014E-01):c := -2.75341050259732E-01+I*(-9.53981025138374E-01):d := -6.52554566900699E-01+I*(4.60142781266951E-01):e := -3.66087204667134E-01+I*(-3.25908949038789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00355120732800E+00+I*(-2.45741716334636E-01):b := 6.94025057668745E-01+I*(2.45825063961881E-02):c := -5.39785590469062E-02+I*(-1.15662160415469E+00):d := -6.19612221530703E-01+I*(5.30377847313916E-01):e := -4.04645692740783E-01+I*(-2.26090204930993E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.05074166266640E-01+I*(3.00575499862501E-02):b := 4.53069065412573E-01+I*(2.83104332443101E-01):c := 2.45849800673049E-01+I*(-1.16956422705961E+00):d := -6.39523151137216E-01+I*(6.05355960809137E-01):e := -4.67445906129883E-01+I*(-1.40034575798960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.52356025035079E-01+I*(1.78032223534818E-01):b := 1.02311439892018E-01+I*(3.26260014409316E-01):c := 4.83851007166123E-01+I*(-9.86752896754676E-01):d := -7.02970810472018E-01+I*(6.49994029159287E-01):e := -5.73111937796102E-01+I*(-6.01825055235392E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.63646410564854E-01+I*(1.28943310002384E-01):b := -1.94124427675067E-01+I*(1.33856529080862E-01):c := 5.48661650825431E-01+I*(-6.93727066411199E-01):d := -7.80267334590165E-01+I*(6.43405404086461E-01):e := -7.79475025697531E-01+I*(-1.34139872968362E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74035760116539E-01+I*(-9.42399424067236E-02):b := -2.97532900336349E-01+I*(-2.04078394430527E-01):c := 4.09956111192711E-01+I*(-4.27596778666242E-01):d := -8.35244820801602E-01+I*(5.88672976486647E-01):e := -1.13455787591435E+00+I*(-2.49805748911491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.72245004322550E-01+I*(-3.87087609484723E-01):b := -1.59528004476456E-01+I*(-5.29421249685544E-01):c := 1.32636251802475E-01+I*(-3.12887352864360E-01):d := -8.42178692301298E-01+I*(5.11406657516973E-01):e := -8.41535443834513E-01+I*(-8.23628202250845E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59112057720928E-01+I*(-6.12573013166532E-01):b := 1.55316235378195E-01+I*(-6.89940498927291E-01):c := -1.53536883069659E-01+I*(-4.03272604191517E-01):d := -7.97824513553146E-01+I*(4.47760216542833E-01):e := -4.32951424300907E-01+I*(-6.62831233544675E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.47199749230607E-01+I*(-6.65189027078311E-01):b := 4.99680700295649E-01+I*(-6.10527401462816E-01):c := -3.14659703156894E-01+I*(-6.56460269031560E-01):d := -7.22936097735196E-01+I*(4.27514530647427E-01):e := -3.56357888361200E-01+I*(-4.59862533544884E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.47011428591988E-01+I*(-3.08808107805849E-01):b := 8.10669129718899E-01+I*(-2.64818960022795E-01):c := -7.33466603990757E-02+I*(-9.10814776505307E-01):d := -6.40529639341630E-01+I*(1.53552402741573E-01):e := -5.29637368388037E-01+I*(-2.19532754592258E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.48853989663834E-01+I*(-3.42337905916057E-02):b := 7.92260757431333E-01+I*(8.81037745474074E-02):c := 1.48015830813750E-01+I*(-1.11345535552163E+00):d := -6.07587293971633E-01+I*(2.23787468788538E-01):e := -4.90725099338601E-01+I*(-9.05224334587273E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.50376948602470E-01+I*(2.41565475729281E-01):b := 5.51304765175160E-01+I*(3.46625600594321E-01):c := 4.47844190533705E-01+I*(-1.12639797842654E+00):d := -6.27498223578147E-01+I*(2.98765582283759E-01):e := -4.86512629945081E-01+I*(2.38833128993730E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.97658807370909E-01+I*(3.89540149277849E-01):b := 2.00547139654605E-01+I*(3.89781282560536E-01):c := 6.85845397026779E-01+I*(-9.43586648121608E-01):d := -6.90945882912948E-01+I*(3.43403650633908E-01):e := -5.11434685174278E-01+I*(1.43152053079210E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.08949192900684E-01+I*(3.40451235745414E-01):b := -9.58887279124798E-02+I*(1.97377797232081E-01):c := 7.50656040686087E-01+I*(-6.50560817778132E-01):d := -7.68242407031096E-01+I*(3.36815025561083E-01):e := -5.90187103114321E-01+I*(2.87218052017213E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.93385424523686E-02+I*(1.17267983336307E-01):b := -1.99297200573762E-01+I*(-1.40557126279307E-01):c := 6.11950501053367E-01+I*(-3.84430530033175E-01):d := -8.23219893242533E-01+I*(2.82082597961269E-01):e := -8.32369316143133E-01+I*(4.51739701856849E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.75477866583797E-02+I*(-1.75579683741693E-01):b := -6.12923047138686E-02+I*(-4.65899981534324E-01):c := 3.34630641663131E-01+I*(-2.69721104231293E-01):d := -8.30153764742229E-01+I*(2.04816278991595E-01):e := -1.41391929807031E+00+I*(1.92931350830959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.04414840056758E-01+I*(-4.01065087423501E-01):b := 2.53551935140782E-01+I*(-6.26419230776072E-01):c := 4.84575067909975E-02+I*(-3.60106355558450E-01):d := -7.85799585994076E-01+I*(1.41169838017455E-01):e := -1.04945463736728E+00+I*(-4.97311522174921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.92502531566437E-01+I*(-4.53681101335280E-01):b := 5.97916400058237E-01+I*(-5.47006133311597E-01):c := -1.12665313296238E-01+I*(-6.13294020398493E-01):d := -7.10911170176126E-01+I*(1.20924152122049E-01):e := -6.51955964783413E-01+I*(-3.83030932490835E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.92551810616263E-01+I*(-2.46221091382289E-01):b := 8.45091357518753E-01+I*(-1.53014154899404E-01):c := 5.36432897169042E-02+I*(-7.47908020581032E-01):d := -4.34245513840878E-01+I*(-7.35799785991893E-02):e := -8.05669302805317E-01+I*(-5.48196096488029E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.94394371688109E-01+I*(2.83532258319547E-02):b := 8.26682985231187E-01+I*(1.99908579670798E-01):c := 2.75005780929730E-01+I*(-9.50548599597351E-01):d := -4.01303168470881E-01+I*(-3.34491255222411E-03):e := -6.15239517409675E-01+I*(8.49625507757031E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.95917330626745E-01+I*(3.04152492152841E-01):b := 5.85726992975015E-01+I*(4.58430405717711E-01):c := 5.74834140649685E-01+I*(-9.63491222502265E-01):d := -4.21214098077395E-01+I*(7.16332009429962E-02):e := -5.11649137804900E-01+I*(2.09109375217997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43199189395184E-01+I*(4.52127165701409E-01):b := 2.34969367454460E-01+I*(5.01586087683926E-01):c := 8.12835347142759E-01+I*(-7.80679892197333E-01):d := -4.84661757412196E-01+I*(1.16271269293146E-01):e := -4.41308077060430E-01+I*(3.35044074442179E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.55104250750412E-02+I*(4.03038252168975E-01):b := -6.14665001126252E-02+I*(3.09182602355471E-01):c := 8.77645990802067E-01+I*(-4.87654061853857E-01):d := -5.61958281530344E-01+I*(1.09682644220321E-01):e := -3.89552255470049E-01+I*(4.89990574983301E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.35121075523356E-01+I*(1.79854999759867E-01):b := -1.64874972773907E-01+I*(-2.87523211559172E-02):c := 7.38940451169347E-01+I*(-2.21523774108899E-01):d := -6.16935767741781E-01+I*(5.49502166205066E-02):e := -3.71256278614562E-01+I*(7.31031131814218E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.36911831317345E-01+I*(-1.12992667318132E-01):b := -2.68700769140143E-02+I*(-3.54095176410934E-01):c := 4.61620591779111E-01+I*(-1.06814348307018E-01):d := -6.23869639241476E-01+I*(-2.23161023491672E-02):e := -5.66930998114173E-01+I*(1.20760195829230E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00447779189669E-02+I*(-3.38478070999941E-01):b := 2.87974162940636E-01+I*(-5.14614425652682E-01):c := 1.75447456906977E-01+I*(-1.97199599634175E-01):d := -5.79515460493325E-01+I*(-8.59625433233072E-02):e := -1.93309349426514E+00+I*(1.03319488089493E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.38042913590713E-01+I*(-3.91094084911720E-01):b := 6.32338627858091E-01+I*(-4.35201328188206E-01):c := 1.43246368197420E-02+I*(-4.50387264474218E-01):d := -5.04627044675374E-01+I*(-1.06208229218713E-01):e := -1.29167210946225E+00+I*(-1.45508963194792E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.57394275583468E-01+I*(-3.61840144839991E-01):b := 7.99593570407874E-01+I*(-4.52405236930770E-02):c := 4.62087910928536E-02+I*(-5.41486638969437E-01):d := -1.30224825312928E-01+I*(-1.14976597230754E-01):e := -1.67167117542092E+00+I*(3.55162594642716E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59236836655314E-01+I*(-8.72658276257474E-02):b := 7.81185198120307E-01+I*(3.07682210877125E-01):c := 2.67571282305679E-01+I*(-7.44127217985757E-01):d := -9.72824799429323E-02+I*(-4.47415311837886E-02):e := -8.87678787082375E-01+I*(4.05740138891115E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.60759795593950E-01+I*(1.88533438695139E-01):b := 5.40229205864135E-01+I*(5.66204036924038E-01):c := 5.67399642025634E-01+I*(-7.57069840890671E-01):d := -1.17193409549446E-01+I*(3.02365823114315E-02):e := -5.57151856790947E-01+I*(4.90242679442144E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.04165436238912E-03+I*(3.36508112243707E-01):b := 1.89471580343580E-01+I*(6.09359718890253E-01):c := 8.05400848518708E-01+I*(-5.74258510585739E-01):d := -1.80641068884247E-01+I*(7.48746506615815E-02):e := -3.39354860144635E-01+I*(5.68411571615819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.80667960107835E-01+I*(2.87419198711273E-01):b := -1.06964287223504E-01+I*(4.16956233561799E-01):c := 8.70211492178016E-01+I*(-2.81232680242262E-01):d := -2.57937593002395E-01+I*(6.82860255887563E-02):e := -1.48451161054522E-01+I*(6.52993117050183E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70278610556151E-01+I*(6.42359463021649E-02):b := -2.10372759884786E-01+I*(7.90213100504102E-02):c := 7.31505952545296E-01+I*(-1.51023924973051E-02):d := -3.12915079213832E-01+I*(1.35535979889418E-02):e := 6.58053065417104E-02+I*(7.67676963854482E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.72069366350140E-01+I*(-2.28611720775835E-01):b := -7.23678640248936E-02+I*(-2.46321545204607E-01):c := 4.54186093155060E-01+I*(9.96070333045766E-02):d := -3.19848950713527E-01+I*(-6.37127209807320E-02):e := 3.82616632308915E-01+I*(9.81855269231470E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.85202312951761E-01+I*(-4.54097124457643E-01):b := 2.42476375829757E-01+I*(-4.06840794446354E-01):c := 1.68012958282927E-01+I*(9.22178197741968E-03):d := -2.75494771965375E-01+I*(-1.27359161954872E-01):e := 1.06429154679389E+00+I*(1.71723549157754E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.88537855791770E-03+I*(-5.06713138369422E-01):b := 5.86840840747212E-01+I*(-3.27427696981879E-01):c := 6.89013819569122E-03+I*(-2.43965882862623E-01):d := -2.00606356147425E-01+I*(-1.47604847850278E-01):e := -4.12612779193700E+00+I*(4.86598675808267E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.51571647620336E-01+I*(-6.01565828103448E-01):b := 6.95464688627020E-01+I*(8.07345378425492E-03):c := -9.21714717397860E-02+I*(-3.88137490244705E-01):d := 1.29277767266401E-01+I*(4.87324847767567E-02):e := 2.58500875064011E+00+I*(-5.60699125847540E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.53414208692182E-01+I*(-3.26991510889205E-01):b := 6.77056316339455E-01+I*(3.60996188354457E-01):c := 1.29191019473040E-01+I*(-5.90778069261024E-01):d := 1.62220112636398E-01+I*(1.18967550823722E-01):e := -2.65647852531031E+00+I*(1.43210342108692E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.54937167630818E-01+I*(-5.11922445683186E-02):b := 4.36100324083282E-01+I*(6.19518014401370E-01):c := 4.29019379192995E-01+I*(-6.03720692165938E-01):d := 1.42309183029884E-01+I*(1.93945664318942E-01):e := -7.08645719132238E-01+I*(1.18561657132605E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.77809736007432E-02+I*(9.67824289802499E-02):b := 8.53426985627270E-02+I*(6.62673696367585E-01):c := 6.67020585686069E-01+I*(-4.20909361861006E-01):d := 7.88615236950828E-02+I*(2.38583732669092E-01):e := -1.24749292291770E-01+I*(9.56201424734885E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.86490588070968E-01+I*(4.76935154478152E-02):b := -2.11093169004358E-01+I*(4.70270211039131E-01):c := 7.31831229345376E-01+I*(-1.27883531517530E-01):d := 1.56499957693500E-03+I*(2.31995107596267E-01):e := 2.05321627964527E-01+I*(7.88680723872511E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.76101238519283E-01+I*(-1.75489736961292E-01):b := -3.14501641665640E-01+I*(1.32335287527742E-01):c := 5.93125689712657E-01+I*(1.38246756227427E-01):d := -5.34124866345020E-02+I*(1.77262679996452E-01):e := 4.65459538210572E-01+I*(6.34911229309824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.77891994313272E-01+I*(-4.68337404039292E-01):b := -1.76496745805747E-01+I*(-1.93007567727275E-01):c := 3.15805830322421E-01+I*(2.52956182029309E-01):d := -6.03463581341972E-02+I*(9.99963610267785E-02):e := 7.30207157692476E-01+I*(4.56418323690782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91024940914894E-01+I*(-6.93822807721101E-01):b := 1.38347494048904E-01+I*(-3.53526816969022E-01):c := 2.96326954502872E-02+I*(1.62570930702152E-01):d := -1.59921793860455E-02+I*(3.63499200526387E-02):e := 1.07922878307795E+00+I*(1.82122116148035E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.02937249405215E-01+I*(-7.46438821632879E-01):b := 4.82711958966358E-01+I*(-2.74113719504547E-01):c := -1.31490124636948E-01+I*(-9.06167341378907E-02):d := 5.88962364319048E-02+I*(1.61042341572327E-02):e := 1.72387379127401E+00+I*(-4.77166661447929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24599510438321E-01+I*(-8.53227829719489E-01):b := 5.81427773225069E-01+I*(-1.80184250479114E-02):c := -2.96747835876309E-01+I*(-3.59614345381085E-01):d := 2.22838116779180E-01+I*(3.40945968528246E-01):e := 5.25969975490027E-01+I*(-1.04293752391807E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.26442071510168E-01+I*(-5.78653512505246E-01):b := 5.63019400937503E-01+I*(3.34904309522291E-01):c := -7.53853446634835E-02+I*(-5.62254924397405E-01):d := 2.55780462149176E-01+I*(4.11181034575211E-01):e := 1.22546356380757E-01+I*(-2.16656241226991E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.27965030448803E-01+I*(-3.02854246184360E-01):b := 3.22063408681331E-01+I*(5.93426135569204E-01):c := 2.24443015056472E-01+I*(-5.75197547302319E-01):d := 2.35869532542663E-01+I*(4.86159148070432E-01):e := -1.85002568515616E+01+I*(1.41429396803912E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.47531107827575E-02+I*(-1.54879572635791E-01):b := -2.86942168392244E-02+I*(6.36581817535419E-01):c := 4.62444221549545E-01+I*(-3.92386216997387E-01):d := 1.72421873207861E-01+I*(5.30797216420582E-01):e := 9.05977567833459E-01+I*(2.02863742660598E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13462725252982E-01+I*(-2.03968486168226E-01):b := -3.25130084406309E-01+I*(4.44178332206964E-01):c := 5.27254865208853E-01+I*(-9.93603866539102E-02):d := 9.51253490897136E-02+I*(5.24208591347756E-01):e := 8.73062017318099E-01+I*(7.94089181448504E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.03073375701298E-01+I*(-4.27151738577334E-01):b := -4.28538557067591E-01+I*(1.06243408695576E-01):c := 3.88549325576133E-01+I*(1.66769901091047E-01):d := 4.01478628782766E-02+I*(4.69476163747942E-01):e := 8.17125239784772E-01+I*(3.11269980267530E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04864131495287E-01+I*(-7.19999405655333E-01):b := -2.90533661207698E-01+I*(-2.19099446559441E-01):c := 1.11229466185897E-01+I*(2.81479326892929E-01):d := 3.32139913785811E-02+I*(3.92209844778268E-01):e := 7.67789356242047E-01+I*(-1.06752103657035E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.17997078096908E-01+I*(-9.45484809337142E-01):b := 2.43105786469524E-02+I*(-3.79618695801189E-01):c := -1.74943668686236E-01+I*(1.91094075565772E-01):d := 7.75681701267327E-02+I*(3.28563403804128E-01):e := 7.16186752192888E-01+I*(-2.73453283460964E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.99093865872285E-02+I*(-9.98100823248920E-01):b := 3.68675043564407E-01+I*(-3.00205598336714E-01):c := -3.36066488773471E-01+I*(-6.20935892742715E-02):d := 1.52456585944683E-01+I*(3.08317717908722E-01):e := 6.48339350458841E-01+I*(-5.80188395933611E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.42307315410599E-01+I*(-9.99070702220368E-01):b := 5.10841964297734E-01+I*(-1.11307480105073E-01):c := -4.71796746924207E-01+I*(-4.69263500859710E-01):d := 1.06678295880917E-01+I*(6.24933917385269E-01):e := 1.08855573711291E-01+I*(-6.76186073143187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.44149876482446E-01+I*(-7.24496385006125E-01):b := 4.92433592010168E-01+I*(2.41615254465129E-01):c := -2.50434255711381E-01+I*(-6.71904079876030E-01):d := 1.39620641250913E-01+I*(6.95168983432234E-01):e := -9.73065013371178E-02+I*(-8.68450384571756E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.45672835421082E-01+I*(-4.48697118685239E-01):b := 2.51477599753995E-01+I*(5.00137080512042E-01):c := 4.93941040085739E-02+I*(-6.84846702780944E-01):d := 1.19709711644400E-01+I*(7.70147096927455E-01):e := -4.17825985515913E-01+I*(-1.35725195645238E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.92954694189521E-01+I*(-3.00722445136670E-01):b := -9.92800257665597E-02+I*(5.43292762478258E-01):c := 2.87395310501648E-01+I*(-5.02035372476012E-01):d := 5.62620523095983E-02+I*(8.14785165277604E-01):e := 4.19549957968661E-01+I*(-3.71002678391290E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.57549202807038E-02+I*(-3.49811358669105E-01):b := -3.95715893333644E-01+I*(3.50889277149803E-01):c := 3.52205954160956E-01+I*(-2.09009542132536E-01):d := -2.10344718085497E-02+I*(8.08196540204779E-01):e := 2.00978594976171E+00+I*(-4.54177693648936E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.85365570729019E-01+I*(-5.72994611078212E-01):b := -4.99124365994926E-01+I*(1.29543536384147E-02):c := 2.13500414528236E-01+I*(5.71207456124213E-02):d := -7.60119580199868E-02+I*(7.53464112604965E-01):e := 1.00510004919808E+00+I*(-2.96496616254953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.87156326523008E-01+I*(-8.65842278156211E-01):b := -3.61119470135033E-01+I*(-3.12388501616602E-01):c := -6.38194448619999E-02+I*(1.71830171414303E-01):d := -8.29458295196821E-02+I*(6.76197793635291E-01):e := 6.45095285723493E-01+I*(-3.81175720663206E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00289273124630E-01+I*(-1.09132768183802E+00):b := -4.62752302803826E-02+I*(-4.72907750858350E-01):c := -3.49992579734134E-01+I*(8.14449200871463E-02):d := -3.85916507715304E-02+I*(6.12551352661151E-01):e := 4.36603530612932E-01+I*(-4.68255382131592E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87798418385049E-01+I*(-1.14394369574980E+00):b := 2.98089234637071E-01+I*(-3.93494653393875E-01):c := -5.11115399821369E-01+I*(-1.71742744752896E-01):d := 3.62967650464201E-02+I*(5.92305666765745E-01):e := 2.72692083064279E-01+I*(-5.59914586499147E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.02827161037902E-01+I*(-9.70852944699942E-01):b := 5.16735146315999E-01+I*(-2.28142725733624E-01):c := -5.35410873952224E-01+I*(-6.65778898217510E-01):d := -1.64849224257482E-01+I*(7.67815213903137E-01):e := -8.98780726239794E-02+I*(-5.21690754758209E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.04669722109748E-01+I*(-6.96278627485698E-01):b := 4.98326774028433E-01+I*(1.24780008836578E-01):c := -3.14048382739398E-01+I*(-8.68419477233830E-01):d := -1.31906878887486E-01+I*(8.38050279950102E-01):e := -2.35547148872819E-01+I*(-5.39266180864991E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.06192681048384E-01+I*(-4.20479361164812E-01):b := 2.57370781772261E-01+I*(3.83301834883491E-01):c := -1.42200230194427E-02+I*(-8.81362100138744E-01):d := -1.51817808494000E-01+I*(9.13028393445322E-01):e := -4.28790357596518E-01+I*(-6.16736015440509E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.53474539816823E-01+I*(-2.72504687616243E-01):b := -9.33868437482942E-02+I*(4.26457516849706E-01):c := 2.23781183473631E-01+I*(-6.98550769833812E-01):d := -2.15265467828801E-01+I*(9.57666461795472E-01):e := -7.02464824485707E-01+I*(-9.22222707342697E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64764925346598E-01+I*(-3.21593601148678E-01):b := -3.89822711315379E-01+I*(2.34054031521252E-01):c := 2.88591827132939E-01+I*(-4.05524939490335E-01):d := -2.92561991946949E-01+I*(9.51077836722647E-01):e := -2.79472306000348E-01+I*(-1.85527557136497E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.48457251017170E-02+I*(-5.44776853557785E-01):b := -4.93231183976661E-01+I*(-1.03880891990137E-01):c := 1.49886287500219E-01+I*(-1.39394651745378E-01):d := -3.47539478158386E-01+I*(8.96345409122832E-01):e := 5.96608560900547E-01+I*(-1.13573514068616E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.66364808957060E-02+I*(-8.37624520635785E-01):b := -3.55226288116767E-01+I*(-4.29223747245154E-01):c := -1.27433571890017E-01+I*(-2.46852259434966E-02):d := -3.54473349658081E-01+I*(8.19079090153158E-01):e := 3.81394844461853E-01+I*(-7.03017357424538E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.60230572502672E-01+I*(-1.06310992431759E+00):b := -4.03820482621171E-02+I*(-5.89742996486902E-01):c := -4.13606706762150E-01+I*(-1.15070477270653E-01):d := -3.10119170909929E-01+I*(7.55432649179018E-01):e := 1.89506647897910E-01+I*(-5.77864673083684E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.48318264012352E-01+I*(-1.11572593822937E+00):b := 3.03982416655337E-01+I*(-5.10329899022426E-01):c := -5.74729526849386E-01+I*(-3.68258142110696E-01):d := -2.35230755091979E-01+I*(7.35186963283613E-01):e := 4.29882113072876E-02+I*(-5.33116240799816E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.67334164069850E-01+I*(-7.27448474378581E-01):b := 8.16143794726629E-01+I*(-4.54675303713105E-01):c := -4.65731807227516E-01+I*(-3.92503222168457E-01):d := -4.25705639211148E-01+I*(4.75427338241513E-01):e := -5.16877155190926E-01+I*(-3.84756081980137E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.69176725141697E-01+I*(-4.52874157164338E-01):b := 7.97735422439063E-01+I*(-1.01752569142904E-01):c := -2.44369316014690E-01+I*(-5.95143801184777E-01):d := -3.92763293841152E-01+I*(5.45662404288478E-01):e := -5.41773647572183E-01+I*(-2.10159980517417E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.70699684080332E-01+I*(-1.77074890843451E-01):b := 5.56779430182891E-01+I*(1.56769256904010E-01):c := 5.54590437052648E-02+I*(-6.08086424089691E-01):d := -4.12674223447665E-01+I*(6.20640517783698E-01):e := -5.88586022652122E-01+I*(-5.52739174842907E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.17981542848771E-01+I*(-2.91002172948827E-02):b := 2.06021804662336E-01+I*(1.99924938870225E-01):c := 2.93460250198339E-01+I*(-4.25275093784759E-01):d := -4.76121882782466E-01+I*(6.65278586133848E-01):e := -6.71317143183694E-01+I*(1.15397097038578E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.29271928378547E-01+I*(-7.81891308273175E-02):b := -9.04140629047489E-02+I*(7.52145354177067E-03):c := 3.58270893857646E-01+I*(-1.32249263441282E-01):d := -5.53418406900614E-01+I*(6.58689961061023E-01):e := -8.55191888236194E-01+I*(3.47567053178293E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.39661277930231E-01+I*(-3.01372383236425E-01):b := -1.93822535566031E-01+I*(-3.30413469969618E-01):c := 2.19565354224927E-01+I*(1.33881024303675E-01):d := -6.08395893112051E-01+I*(6.03957533461209E-01):e := -1.49609104198761E+00+I*(6.52178612494940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.37870522136242E-01+I*(-5.94220050314425E-01):b := -5.58176397061380E-02+I*(-6.55756325224635E-01):c := -5.77545051653089E-02+I*(2.48590450105556E-01):d := -6.15329764611746E-01+I*(5.26691214491535E-01):e := -2.43876494848622E+00+I*(-1.22010362823334E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.24737575534621E-01+I*(-8.19705453996234E-01):b := 2.59026600148512E-01+I*(-8.16275574466383E-01):c := -3.43927640037443E-01+I*(1.58205198778400E-01):d := -5.70975585863595E-01+I*(4.63044773517395E-01):e := -7.30885951239238E-01+I*(-1.11390974741015E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.12825267044300E-01+I*(-8.72321467908012E-01):b := 6.03391065065967E-01+I*(-7.36862477001907E-01):c := -5.05050460124678E-01+I*(-9.49824660616434E-02):d := -4.96087170045645E-01+I*(4.42799087621989E-01):e := -5.29535376863011E-01+I*(-6.35484219929450E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.84783894130367E-01+I*(-4.65986548420001E-01):b := 9.32227390764844E-01+I*(-4.69159879862271E-01):c := -2.83248397555568E-01+I*(-4.89275448301426E-01):d := -6.13566506840833E-01+I*(2.32836008016055E-01):e := -5.33994375485077E-01+I*(-1.38549763710535E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.86626455202213E-01+I*(-1.91412231205758E-01):b := 9.13819018477278E-01+I*(-1.16237145292069E-01):c := -6.18859063427426E-02+I*(-6.91916027317745E-01):d := -5.80624161470837E-01+I*(3.03071074063021E-01):e := -4.70628454243116E-01+I*(-3.35961963299214E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.88149414140849E-01+I*(8.43870351151286E-02):b := 6.72863026221105E-01+I*(1.42284680754844E-01):c := 2.37942453377213E-01+I*(-7.04858650222660E-01):d := -6.00535091077350E-01+I*(3.78049187558241E-01):e := -4.46718430455695E-01+I*(6.37930657698193E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.35431272909288E-01+I*(2.32361708663697E-01):b := 3.22105400700550E-01+I*(1.85440362721059E-01):c := 4.75943659870286E-01+I*(-5.22047319917728E-01):d := -6.63982750412152E-01+I*(4.22687255908391E-01):e := -4.50126071351502E-01+I*(1.65680220596743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46721658439063E-01+I*(1.83272795131263E-01):b := 2.56695331334655E-02+I*(-6.96312260739528E-03):c := 5.40754303529594E-01+I*(-2.29021489574251E-01):d := -7.41279274530300E-01+I*(4.16098630835565E-01):e := -4.94026423402117E-01+I*(2.87067903498482E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.57111007990748E-01+I*(-3.99104572778449E-02):b := -7.77389395278166E-02+I*(-3.44898046118784E-01):c := 4.02048763896875E-01+I*(3.71087981707058E-02):d := -7.96256760741737E-01+I*(3.61366203235751E-01):e := -6.45058639383058E-01+I*(4.31276063243171E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55320252196758E-01+I*(-3.32758124355844E-01):b := 6.02659563320762E-02+I*(-6.70240901373801E-01):c := 1.24728904506639E-01+I*(1.51818223972587E-01):d := -8.03190632241432E-01+I*(2.84099884266077E-01):e := -1.05216939300248E+00+I*(3.86088804394141E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.42187305595137E-01+I*(-5.58243528037653E-01):b := 3.75110196186727E-01+I*(-8.30760150615549E-01):c := -1.61444230365494E-01+I*(6.14329726454309E-02):d := -7.58836453493280E-01+I*(2.20453443291937E-01):e := -1.05497050240658E+00+I*(-1.78741279162756E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.30274997104816E-01+I*(-6.10859541949432E-01):b := 7.19474661104182E-01+I*(-7.51347053151073E-01):c := -3.22567050452730E-01+I*(-1.91754692194612E-01):d := -6.83948037675330E-01+I*(2.00207757396531E-01):e := -6.91330316900044E-01+I*(-2.46298410851324E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.30086676466196E-01+I*(-2.54478622676970E-01):b := 1.03046309052743E+00+I*(-4.05638611711051E-01):c := -8.12540076949115E-02+I*(-4.46109199668359E-01):d := -6.01541579281764E-01+I*(-7.37543705093231E-02):e := -5.34312234966485E-01+I*(6.77386999261664E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.31929237538043E-01+I*(2.00956945372737E-02):b := 1.01205471823987E+00+I*(-5.27158771408493E-02):c := 1.40108483517914E-01+I*(-6.48749778684678E-01):d := -5.68599233911768E-01+I*(-3.51930446235796E-03):e := -4.28661167112781E-01+I*(1.04728022688291E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.33452196476679E-01+I*(2.95894960858160E-01):b := 7.71098725983693E-01+I*(2.05805948906064E-01):c := 4.39936843237869E-01+I*(-6.61692401589592E-01):d := -5.88510163518281E-01+I*(7.14588090328625E-02):e := -3.67463236634664E-01+I*(1.61411642050096E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.80734055245117E-01+I*(4.43869634406728E-01):b := 4.20341100463138E-01+I*(2.48961630872279E-01):c := 6.77938049730943E-01+I*(-4.78881071284660E-01):d := -6.51957822853083E-01+I*(1.16096877383012E-01):e := -3.31663343887800E-01+I*(2.28620047408291E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.92024440774893E-01+I*(3.94780720874293E-01):b := 1.23905232896053E-01+I*(5.65581455438241E-02):c := 7.42748693390250E-01+I*(-1.85855240941184E-01):d := -7.29254346971230E-01+I*(1.09508252310187E-01):e := -3.18796990974087E-01+I*(3.12310414002008E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.41379032657730E-03+I*(1.71597468465186E-01):b := 2.04967602347708E-02+I*(-2.81376777967564E-01):c := 6.04043153757531E-01+I*(8.02750468037731E-02):d := -7.84231833182667E-01+I*(5.47758247103729E-02):e := -3.49352469142557E-01+I*(4.23609374439035E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.23034532588227E-04+I*(-1.21250198612814E-01):b := 1.58501656094664E-01+I*(-6.06719633222581E-01):c := 3.26723294367295E-01+I*(1.94984472605655E-01):d := -7.91165704682363E-01+I*(-2.24904942593007E-02):e := -5.00573961016344E-01+I*(5.39045917569590E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87490087930967E-01+I*(-3.46735602294623E-01):b := 4.73345895949314E-01+I*(-7.67238882464329E-01):c := 4.05501594951616E-02+I*(1.04599221278498E-01):d := -7.46811525934211E-01+I*(-8.61369352334408E-02):e := -7.75159224045255E-01+I*(4.09261834662603E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.75577779440646E-01+I*(-3.99351616206401E-01):b := 8.17710360866769E-01+I*(-6.87825784999854E-01):c := -1.20572660592074E-01+I*(-1.48588443561545E-01):d := -6.71923110116261E-01+I*(-1.06382621128847E-01):e := -7.09198235851585E-01+I*(1.19735600922752E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.75627058490471E-01+I*(-1.91891606253410E-01):b := 1.06488531832729E+00+I*(-2.93833806587661E-01):c := 4.57359424210683E-02+I*(-2.83202443744083E-01):d := -3.95257453781012E-01+I*(-3.00886751850085E-01):e := -5.20347823200362E-01+I*(2.90064078382198E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.77469619562317E-01+I*(8.26827109608333E-02):b := 1.04647694603972E+00+I*(5.90889279825408E-02):c := 2.67098433633894E-01+I*(-4.85843022760403E-01):d := -3.62315108411016E-01+I*(-2.30651685803120E-01):e := -3.97650465705376E-01+I*(2.44305331898683E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.78992578500953E-01+I*(3.58481977281719E-01):b := 8.05520953783547E-01+I*(3.17610754029454E-01):c := 5.66926793353849E-01+I*(-4.98785645665317E-01):d := -3.82226038017529E-01+I*(-1.55673572307899E-01):e := -3.10050871291459E-01+I*(2.58046575155839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26274437269392E-01+I*(5.06456650830288E-01):b := 4.54763328262992E-01+I*(3.60766435995669E-01):c := 8.04927999846922E-01+I*(-3.15974315360385E-01):d := -4.45673697352330E-01+I*(-1.11035503957749E-01):e := -2.47002158513622E-01+I*(2.95057978029021E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.24351772008322E-02+I*(4.57367737297853E-01):b := 1.58327460695907E-01+I*(1.68362950667214E-01):c := 8.69738643506230E-01+I*(-2.29484850169090E-02):d := -5.22970221470478E-01+I*(-1.17624129030575E-01):e := -1.99788319666272E-01+I*(3.50992811981003E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.52045827649148E-01+I*(2.34184484888746E-01):b := 5.49189880346253E-02+I*(-1.69571972844174E-01):c := 7.31033103873511E-01+I*(2.43181802728048E-01):d := -5.77947707681915E-01+I*(-1.72356556630389E-01):e := -1.71383791132600E-01+I*(4.35335176719779E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.53836583443137E-01+I*(-5.86631821892537E-02):b := 1.92923883894518E-01+I*(-4.94914828099191E-01):c := 4.53713244483275E-01+I*(3.57891228529930E-01):d := -5.84881579181611E-01+I*(-2.49622875600063E-01):e := -1.96314982036448E-01+I*(5.64696345775291E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.69695300447583E-02+I*(-2.84148585871062E-01):b := 5.07768123749169E-01+I*(-6.55434077340939E-01):c := 1.67540109611142E-01+I*(2.67505977202773E-01):d := -5.40527400433459E-01+I*(-3.13269316574203E-01):e := -3.84328954899142E-01+I*(6.77778249651891E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21118161464921E-01+I*(-3.36764599782841E-01):b := 8.52132588666623E-01+I*(-5.76020979876463E-01):c := 6.41728952390613E-03+I*(1.43183123627303E-02):d := -4.65638984615509E-01+I*(-3.33515002469609E-01):e := -6.01305126096418E-01+I*(4.92588526751498E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.40469523457676E-01+I*(-3.07510659711112E-01):b := 1.01938753121641E+00+I*(-1.86060175381334E-01):c := 3.83014437970175E-02+I*(-7.67810621324889E-02):d := -9.12367652530626E-02+I*(-3.42283370481650E-01):e := -4.74790602280017E-01+I*(6.04809050129415E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.42312084529523E-01+I*(-3.29363424968687E-02):b := 1.00097915892884E+00+I*(1.66862559188868E-01):c := 2.59663935009843E-01+I*(-2.79421641148808E-01):d := -5.82944198830665E-02+I*(-2.72048304434685E-01):e := -3.73417395915432E-01+I*(4.26338567758987E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43835043468159E-01+I*(2.42862923824017E-01):b := 7.60023166672667E-01+I*(4.25384385235781E-01):c := 5.59492294729798E-01+I*(-2.92364264053723E-01):d := -7.82053494895797E-02+I*(-1.97070190939464E-01):e := -2.61383592690734E-01+I*(3.76933901226408E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.88309776340227E-03+I*(3.90837597372586E-01):b := 4.09265541152113E-01+I*(4.68540067201997E-01):c := 7.97493501222872E-01+I*(-1.09552933748791E-01):d := -1.41653008824381E-01+I*(-1.52432122589314E-01):e := -1.72008675736359E-01+I*(3.76244278349931E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.97592712233627E-01+I*(3.41748683840151E-01):b := 1.12829673585028E-01+I*(2.76136581873542E-01):c := 8.62304144882179E-01+I*(1.83472896594685E-01):d := -2.18949532942529E-01+I*(-1.59020747662139E-01):e := -9.56400326616846E-02+I*(4.01383947303986E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.87203362681942E-01+I*(1.18565431431044E-01):b := 9.42120092374589E-03+I*(-6.17983416378465E-02):c := 7.23598605249460E-01+I*(4.49603184339643E-01):d := -2.73927019153966E-01+I*(-2.13753175261954E-01):e := -2.48133632876367E-02+I*(4.54327599128717E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.88994118475931E-01+I*(-1.74282235646956E-01):b := 1.47426096783638E-01+I*(-3.87141196892864E-01):c := 4.46278745859224E-01+I*(5.64312610141524E-01):d := -2.80860890653661E-01+I*(-2.91019494231627E-01):e := 3.55679112091820E-02+I*(5.57771779177535E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02127065077553E-01+I*(-3.99767639328765E-01):b := 4.62270336638289E-01+I*(-5.47660446134611E-01):c := 1.60105610987091E-01+I*(4.73927358814367E-01):d := -2.36506711905510E-01+I*(-3.54665935205768E-01):e := 1.71832352955648E-02+I*(7.55979476160453E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.40393735678738E-02+I*(-4.52383653240543E-01):b := 8.06634801555744E-01+I*(-4.68247348670136E-01):c := -1.01720910014449E-03+I*(2.20739693974325E-01):d := -1.61618296087560E-01+I*(-3.74911621101174E-01):e := -2.88116160795450E-01+I*(8.85785686903395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.34646895494544E-01+I*(-5.47236342974569E-01):b := 9.15258649435553E-01+I*(-1.32746197904002E-01):c := -1.00078819035622E-01+I*(7.65680865922435E-02):d := 1.68265827326267E-01+I*(-1.78574288474139E-01):e := -2.73538496206943E-01+I*(1.26667211378413E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.36489456566391E-01+I*(-2.72662025760326E-01):b := 8.96850277147987E-01+I*(2.20176536666200E-01):c := 1.21283672177203E-01+I*(-1.26072492424076E-01):d := 2.01208172696263E-01+I*(-1.08339222427174E-01):e := -3.74850936835189E-01+I*(7.59658000919048E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.38012415505027E-01+I*(3.13724056056005E-03):b := 6.55894284891815E-01+I*(4.78698362713113E-01):c := 4.21112031897159E-01+I*(-1.39015115328990E-01):d := 1.81297243089750E-01+I*(-3.33611089319535E-02):e := -2.24548759837994E-01+I*(5.67889623567172E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.14705725726535E-01+I*(1.51111914109129E-01):b := 3.05136659371259E-01+I*(5.21854044679328E-01):c := 6.59113238390232E-01+I*(4.37962149759414E-02):d := 1.17849583754949E-01+I*(1.12769594181965E-02):e := -9.46012131027352E-02+I*(5.00333265717640E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.03415340196759E-01+I*(1.02023000576694E-01):b := 8.70079180417472E-03+I*(3.29450559350874E-01):c := 7.23923882049540E-01+I*(3.36822045319418E-01):d := 4.05530596368009E-02+I*(4.68833434537126E-03):e := 1.79513445084500E-02+I*(4.78060499219071E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.93025990645074E-01+I*(-1.21160251832414E-01):b := -9.47076808571072E-02+I*(-8.48436416051456E-03):c := 5.85218342416820E-01+I*(6.02952333064375E-01):d := -1.44244265746362E-02+I*(-5.00440932544430E-02):e := 1.30750759491531E-01+I*(4.83933025047787E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.94816746439064E-01+I*(-4.14007918910413E-01):b := 4.32972150027854E-02+I*(-3.33827219415532E-01):c := 3.07898483026585E-01+I*(7.17661758866257E-01):d := -2.13582980743317E-02+I*(-1.27310412224117E-01):e := 2.62773164700378E-01+I*(5.28617425682945E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.07949693040685E-01+I*(-6.39493322592222E-01):b := 3.58141454857436E-01+I*(-4.94346468657280E-01):c := 2.17253481544514E-02+I*(6.27276507539100E-01):d := 2.29958806738200E-02+I*(-1.90956853198257E-01):e := 4.29940929312272E-01+I*(6.75746575340316E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19862001531006E-01+I*(-6.92109336504000E-01):b := 7.02505919774890E-01+I*(-4.14933371192804E-01):c := -1.39397471932784E-01+I*(3.74088842699057E-01):d := 9.78842964917703E-02+I*(-2.11202539093663E-01):e := 4.66267001301789E-01+I*(1.13839005514265E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.07674758312530E-01+I*(-7.98898344590611E-01):b := 8.01221734033601E-01+I*(-1.58838076736169E-01):c := -3.04655183172145E-01+I*(1.05091231455863E-01):d := 2.61826176839046E-01+I*(1.13639195277351E-01):e := 3.62334917963191E+00+I*(3.20582711767887E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09517319384376E-01+I*(-5.24324027376367E-01):b := 7.82813361746035E-01+I*(1.94084657834034E-01):c := -8.32926919593198E-02+I*(-9.75493475604565E-02):d := 2.94768522209042E-01+I*(1.83874261324316E-01):e := -8.64967102128188E-01+I*(1.86489356209701E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.11040278323012E-01+I*(-2.48524761055481E-01):b := 5.41857369489863E-01+I*(4.52606483880947E-01):c := 2.16535667760635E-01+I*(-1.10491970465371E-01):d := 2.74857592602528E-01+I*(2.58852374819536E-01):e := -3.15759427998005E-01+I*(1.00518765146205E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.16778629085488E-02+I*(-1.00550087506913E-01):b := 1.91099743969308E-01+I*(4.95762165847162E-01):c := 4.54536874253709E-01+I*(7.23193598395612E-02):d := 2.11409933267727E-01+I*(3.03490443169686E-01):e := -2.73486910792129E-02+I*(7.61006699624686E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.30387477378774E-01+I*(-1.49639001039347E-01):b := -1.05336123597777E-01+I*(3.03358680518708E-01):c := 5.19347517913017E-01+I*(3.65345190183038E-01):d := 1.34113409149579E-01+I*(2.96901818096861E-01):e := 1.70579475519663E-01+I*(6.33653019365350E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.19998127827089E-01+I*(-3.72822253448455E-01):b := -2.08744596259059E-01+I*(-3.45762429926809E-02):c := 3.80641978280297E-01+I*(6.31475477927995E-01):d := 7.91359229381421E-02+I*(2.42169390497047E-01):e := 3.47088694073112E-01+I*(5.41947393433519E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.21788883621078E-01+I*(-6.65669920526455E-01):b := -7.07397003991662E-02+I*(-3.59919098247698E-01):c := 1.03322118890061E-01+I*(7.46184903729876E-01):d := 7.22020514384468E-02+I*(1.64903071527373E-01):e := 5.47406768115524E-01+I*(4.59469252468031E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.34921830222700E-01+I*(-8.91155324208263E-01):b := 2.44104539455484E-01+I*(-5.20438347489446E-01):c := -1.82851015982072E-01+I*(6.55799652402720E-01):d := 1.16556230186598E-01+I*(1.01256630553233E-01):e := 8.47156234504521E-01+I*(3.73948305304667E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.68341387130202E-02+I*(-9.43771338120042E-01):b := 5.88469004372939E-01+I*(-4.41025250024970E-01):c := -3.43973836069307E-01+I*(4.02611987562677E-01):d := 1.91444646004549E-01+I*(8.10109446578267E-02):e := 1.52698820568286E+00+I*(3.29189364864067E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.25382563284808E-01+I*(-9.44741217091489E-01):b := 7.30635925106266E-01+I*(-2.52127131793330E-01):c := -4.79704094220043E-01+I*(-4.55792402276230E-03):d := 1.45666355940782E-01+I*(3.97627144134373E-01):e := 4.66748634742143E-03+I*(-1.85134411785255E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.27225124356654E-01+I*(-6.70166899877246E-01):b := 7.12227552818700E-01+I*(1.00795602776872E-01):c := -2.58341603007217E-01+I*(-2.07198503039082E-01):d := 1.78608701310779E-01+I*(4.67862210181338E-01):e := -1.94777561891865E+00+I*(-1.28259764886143E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.28748083295290E-01+I*(-3.94367633556360E-01):b := 4.71271560562528E-01+I*(3.59317428823785E-01):c := 4.14867567127379E-02+I*(-2.20141125943996E-01):d := 1.58697771704265E-01+I*(5.42840323676559E-01):e := -1.79535524581177E+00+I*(9.36363314169863E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76029942063729E-01+I*(-2.46392960007791E-01):b := 1.20513935041973E-01+I*(4.02473110790001E-01):c := 2.79487963205811E-01+I*(-3.73297956390643E-02):d := 9.52501123694639E-02+I*(5.87478392026709E-01):e := -4.52041472486430E-01+I*(1.43144874968919E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12679672406495E-01+I*(-2.95481873540226E-01):b := -1.75921932525112E-01+I*(2.10069625461546E-01):c := 3.44298606865119E-01+I*(2.55696034704412E-01):d := 1.79535882513160E-02+I*(5.80889766953884E-01):e := 3.51737304172604E-01+I*(1.15135413985672E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02290322854810E-01+I*(-5.18665125949333E-01):b := -2.79330405186394E-01+I*(-1.27865298049842E-01):c := 2.05593067232400E-01+I*(5.21826322449369E-01):d := -3.70238979601212E-02+I*(5.26157339354069E-01):e := 7.89332444118657E-01+I*(7.27995370406214E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.04081078648800E-01+I*(-8.11512793027333E-01):b := -1.41325509326501E-01+I*(-4.53208153304859E-01):c := -7.17267921578357E-02+I*(6.36535748251250E-01):d := -4.39577694598166E-02+I*(4.48891020384395E-01):e := 1.02861115055242E+00+I*(2.49182403552675E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.17214025250421E-01+I*(-1.03699819670914E+00):b := 1.73518730528149E-01+I*(-6.13727402546607E-01):c := -3.57899927029969E-01+I*(5.46150496924094E-01):d := 3.96409288335093E-04+I*(3.85244579410255E-01):e := 1.10607509721237E+00+I*(-3.19469829062942E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.70873666259258E-01+I*(-1.08961421062092E+00):b := 5.17883195445604E-01+I*(-5.34314305082132E-01):c := -5.19022747117205E-01+I*(2.92962832084051E-01):d := 7.52848251062856E-02+I*(3.64998893514849E-01):e := 9.13469117413148E-01+I*(-1.04853544366464E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.85902408912110E-01+I*(-9.16523459571063E-01):b := 7.36529107124532E-01+I*(-3.68962377421882E-01):c := -5.43318221248060E-01+I*(-2.01073321380562E-01):d := -1.25861164197617E-01+I*(5.40508440652241E-01):e := -4.49746713174678E-01+I*(-7.83161982597337E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.87744969983957E-01+I*(-6.41949142356820E-01):b := 7.18120734836966E-01+I*(-1.60396428516794E-02):c := -3.21955730035234E-01+I*(-4.03713900396881E-01):d := -9.29188188276204E-02+I*(6.10743506699206E-01):e := -7.22978873011062E-01+I*(-5.20573362194007E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.89267928922593E-01+I*(-3.66149876035933E-01):b := 4.77164742580793E-01+I*(2.42482183195234E-01):c := -2.21273703152788E-02+I*(-4.16656523301796E-01):d := -1.12829748434134E-01+I*(6.85721620194426E-01):e := -9.72993149762218E-01+I*(-1.88269393185304E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.36549787691032E-01+I*(-2.18175202487365E-01):b := 1.26407117060238E-01+I*(2.85637865161449E-01):c := 2.15873836177795E-01+I*(-2.33845192996864E-01):d := -1.76277407768935E-01+I*(7.30359688544576E-01):e := -1.22722724635536E+00+I*(3.50511962342818E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.47840173220807E-01+I*(-2.67264116019799E-01):b := -1.70028750506846E-01+I*(9.32343798329947E-02):c := 2.80684479837103E-01+I*(5.91806373466125E-02):d := -2.53573931887083E-01+I*(7.23771063471751E-01):e := -1.31237068003750E+00+I*(1.58425351177690E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.17704772275082E-02+I*(-4.90447368428907E-01):b := -2.73437223168128E-01+I*(-2.44700543678394E-01):c := 1.41978940204383E-01+I*(3.25310925091569E-01):d := -3.08551418098520E-01+I*(6.69038635871937E-01):e := 2.12491670689980E+00+I*(3.40700961295670E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.35612330214975E-02+I*(-7.83295035506906E-01):b := -1.35432327308236E-01+I*(-5.70043398933411E-01):c := -1.35340919185852E-01+I*(4.40020350893451E-01):d := -3.15485289598215E-01+I*(5.91772316902263E-01):e := 2.11709527954856E+00+I*(-1.14457360957541E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.43305820376881E-01+I*(-1.00878043918871E+00):b := 1.79411912546415E-01+I*(-7.30562648175158E-01):c := -4.21514054057986E-01+I*(3.49635099566295E-01):d := -2.71131110850064E-01+I*(5.28125875928123E-01):e := 5.45510996025560E-01+I*(-1.28020148398454E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.31393511886560E-01+I*(-1.06139645310049E+00):b := 5.23776377463869E-01+I*(-6.51149550710683E-01):c := -5.82636874145221E-01+I*(9.64474347262518E-02):d := -1.96242695032113E-01+I*(5.07880190032717E-01):e := -8.62536909706765E-02+I*(-1.03200439091548E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.02763764655717E+00+I*(-5.07388336151689E-01):b := 7.77064855959067E-01+I*(-1.44056792323053E-01):c := -4.64787799649121E-01+I*(-3.18353553954147E-01):d := -5.00447045930065E-01+I*(2.44359156931046E-01):e := -8.15000782521800E-01+I*(-1.31961493766265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.12948020762901E+00+I*(-2.32814018937446E-01):b := 7.58656483671501E-01+I*(2.08865942247149E-01):c := -2.43425308436296E-01+I*(-5.20994132970466E-01):d := -4.67504700560069E-01+I*(3.14594222978011E-01):e := -6.39789850798554E-01+I*(4.55553058898470E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03100316656765E+00+I*(4.29852473834403E-02):b := 5.17700491415328E-01+I*(4.67387768294062E-01):c := 5.64030512836595E-02+I*(-5.33936755875381E-01):d := -4.87415630166582E-01+I*(3.89572336473232E-01):e := -5.44344646459506E-01+I*(1.91424748000132E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.78285025336087E-01+I*(1.90959920932009E-01):b := 1.66942865894774E-01+I*(5.10543450260277E-01):c := 2.94404257776733E-01+I*(-3.51125425570449E-01):d := -5.50863289501384E-01+I*(4.34210404823382E-01):e := -4.79087144672233E-01+I*(3.36548443351289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.89575410865862E-01+I*(1.41871007399575E-01):b := -1.29493001672311E-01+I*(3.18139964931823E-01):c := 3.59214901436041E-01+I*(-5.80995952269725E-02):d := -6.28159813619532E-01+I*(4.27621779750557E-01):e := -4.31331436481231E-01+I*(5.15685022955838E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.99964760417547E-01+I*(-8.13122450095331E-02):b := -2.32901474333593E-01+I*(-1.97949585795659E-02):c := 2.20509361803321E-01+I*(2.08030692517985E-01):d := -6.83137299830969E-01+I*(3.72889352150742E-01):e := -4.20393454696309E-01+I*(8.02283048596055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.98174004623558E-01+I*(-3.74159912087533E-01):b := -9.48965784737003E-02+I*(-3.45137813834583E-01):c := -5.68104975869142E-02+I*(3.22740118319866E-01):d := -6.90071171330664E-01+I*(2.95623033181068E-01):e := -6.94265410320134E-01+I*(1.41737447001170E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.85041058021936E-01+I*(-5.99645315769342E-01):b := 2.19947661380951E-01+I*(-5.05657063076331E-01):c := -3.42983632459048E-01+I*(2.32354866992710E-01):d := -6.45716992582512E-01+I*(2.31976592206928E-01):e := -2.54295519664746E+00+I*(7.40212460059456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.73128749531615E-01+I*(-6.52261329681120E-01):b := 5.64312126298405E-01+I*(-4.26243965611855E-01):c := -5.04106452546284E-01+I*(-2.08327978473332E-02):d := -5.70828576764562E-01+I*(2.11730906311522E-01):e := -1.28621480245446E+00+I*(-3.47267191595889E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04508737661768E+00+I*(-2.45926410193108E-01):b := 8.93148451997281E-01+I*(-1.58541368472219E-01):c := -2.82304389977173E-01+I*(-4.15125780087116E-01):d := -6.88307913559751E-01+I*(1.76782670558797E-03):e := -5.71236020032971E-01+I*(9.30710192705280E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.14692993768953E+00+I*(2.86479070211346E-02):b := 8.74740079709716E-01+I*(1.94381366097983E-01):c := -6.09418987643475E-02+I*(-6.17766359103435E-01):d := -6.55365568189755E-01+I*(7.20028927525533E-02):e := -4.48642566524991E-01+I*(1.26494805835041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04845289662816E+00+I*(3.04447173342021E-01):b := 6.33784087453543E-01+I*(4.52903192144896E-01):c := 2.38886460955608E-01+I*(-6.30708982008349E-01):d := -6.75276497796268E-01+I*(1.46981006247774E-01):e := -3.76632854443786E-01+I*(1.83765242310847E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.95734755396603E-01+I*(4.52421846890590E-01):b := 2.83026461932988E-01+I*(4.96058874111111E-01):c := 4.76887667448681E-01+I*(-4.47897651703418E-01):d := -7.38724157131070E-01+I*(1.91619074597924E-01):e := -3.31723183467985E-01+I*(2.52752388485907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07025140926379E-01+I*(4.03332933358155E-01):b := -1.34094056340968E-02+I*(3.03655388782657E-01):c := 5.41698311107989E-01+I*(-1.54871821359941E-01):d := -8.16020681249217E-01+I*(1.85030449525099E-01):e := -3.08658391417663E-01+I*(3.39945790840451E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.17414490478063E-01+I*(1.80149680949047E-01):b := -1.16817878295379E-01+I*(-3.42795347287318E-02):c := 4.02992771475270E-01+I*(1.11258466385016E-01):d := -8.70998167460655E-01+I*(1.30298021925284E-01):e := -3.24955015565230E-01+I*(4.60794106433427E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.15623734684074E-01+I*(-1.12697986128952E-01):b := 2.11870175645142E-02+I*(-3.59622389983749E-01):c := 1.25672912085034E-01+I*(2.25967892186898E-01):d := -8.77932038960350E-01+I*(5.30317029556101E-02):e := -4.62644666694420E-01+I*(6.10559732615234E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02490788082453E-01+I*(-3.38183389810761E-01):b := 3.36031257419165E-01+I*(-5.20141639225496E-01):c := -1.60500222787100E-01+I*(1.35582640859741E-01):d := -8.33577860212198E-01+I*(-1.06147380185297E-02):e := -7.97532689029518E-01+I*(5.27572951700996E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.90578479592132E-01+I*(-3.90799403722540E-01):b := 6.80395722336620E-01+I*(-4.40728541761021E-01):c := -3.21623042874335E-01+I*(-1.17605023980302E-01):d := -7.58689444394248E-01+I*(-3.08604239139358E-02):e := -7.71636890445025E-01+I*(1.72410293709169E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.90390158953512E-01+I*(-3.44184844500777E-02):b := 9.91384151759869E-01+I*(-9.50201003209997E-02):c := -8.03100001165169E-02+I*(-3.71959531454049E-01):d := -6.76282986000682E-01+I*(-3.04822551819790E-01):e := -4.32172049786646E-01+I*(2.33019894695400E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.92232720025358E-01+I*(2.40155832764165E-01):b := 9.72975779472303E-01+I*(2.57902634249202E-01):c := 1.41052491096309E-01+I*(-5.74600110470368E-01):d := -6.43340640630686E-01+I*(-2.34587485772825E-01):e := -3.44505173212964E-01+I*(2.03438955446192E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.93755678963994E-01+I*(5.15955099085052E-01):b := 7.32019787216130E-01+I*(5.16424460296115E-01):c := 4.40880850816264E-01+I*(-5.87542733375282E-01):d := -6.63251570237199E-01+I*(-1.59609372277604E-01):e := -2.79263615685902E-01+I*(2.17099174307913E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.41037537732433E-01+I*(6.63929772633620E-01):b := 3.81262161695575E-01+I*(5.59580142262331E-01):c := 6.78882057309338E-01+I*(-4.04731403070351E-01):d := -7.26699229572001E-01+I*(-1.14971303927454E-01):e := -2.32836453829766E-01+I*(2.50031310956238E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.52327923262209E-01+I*(6.14840859101186E-01):b := 8.48262941284904E-02+I*(3.67176656933877E-01):c := 7.43692700968646E-01+I*(-1.11705572726874E-01):d := -8.03995753690148E-01+I*(-1.21559929000280E-01):e := -2.01424362483705E-01+I*(2.98769086536964E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.62717272813893E-01+I*(3.91657606692078E-01):b := -1.85821785327915E-02+I*(2.92417334224876E-02):c := 6.04987161335926E-01+I*(1.54424715018083E-01):d := -8.58973239901585E-01+I*(-1.76292356600094E-01):e := -1.91208330601154E-01+I*(3.68478457423863E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.60926517019904E-01+I*(9.88099396140785E-02):b := 1.19422717327101E-01+I*(-2.96101121832530E-01):c := 3.27667301945690E-01+I*(2.69134140819965E-01):d := -8.65907111401281E-01+I*(-2.53558675569768E-01):e := -2.33098163147047E-01+I*(4.60243791596771E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.47793570418283E-01+I*(-1.26675464067730E-01):b := 4.34266957181752E-01+I*(-4.56620371074277E-01):c := 4.14941670735563E-02+I*(1.78748889492808E-01):d := -8.21552932653129E-01+I*(-3.17205116543908E-01):e := -3.80357768975142E-01+I*(5.01697486947937E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.35881261927962E-01+I*(-1.79291477979509E-01):b := 7.78631422099207E-01+I*(-3.77207273609802E-01):c := -1.19628653013679E-01+I*(-7.44387753472350E-02):d := -7.46664516835179E-01+I*(-3.37450802439314E-01):e := -4.93677144910840E-01+I*(3.60268660102893E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.35930540977787E-01+I*(2.81685319734826E-02):b := 1.02580637955972E+00+I*(1.67847048023906E-02):c := 4.66799499994634E-02+I*(-2.09052775529773E-01):d := -4.69998860499930E-01+I*(-5.31954933160552E-01):e := -3.21195710835547E-01+I*(3.51447735114556E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.37773102049633E-01+I*(3.02742849187726E-01):b := 1.00739800727216E+00+I*(3.69707439372593E-01):c := 2.68042441212289E-01+I*(-4.11693354546093E-01):d := -4.37056515129934E-01+I*(-4.61719867113587E-01):e := -2.69331421133370E-01+I*(2.81202575139548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.39296060988269E-01+I*(5.78542115508611E-01):b := 7.66442015015984E-01+I*(6.28229265419505E-01):c := 5.67870800932244E-01+I*(-4.24635977451007E-01):d := -4.56967444736447E-01+I*(-3.86741753618367E-01):e := -2.10384774296805E-01+I*(2.62831952630476E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.86577919756708E-01+I*(7.26516789057180E-01):b := 4.15684389495430E-01+I*(6.71384947385721E-01):c := 8.05872007425318E-01+I*(-2.41824647146075E-01):d := -5.20415104071248E-01+I*(-3.42103685268216E-01):e := -1.61073055525731E-01+I*(2.71201456615109E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.78683052864834E-02+I*(6.77427875524746E-01):b := 1.19248521928345E-01+I*(4.78981462057267E-01):c := 8.70682651084626E-01+I*(5.12011831974010E-02):d := -5.97711628189396E-01+I*(-3.48692310341042E-01):e := -1.21135353443179E-01+I*(2.97264411848230E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.17423451618320E-02+I*(4.54244623115638E-01):b := 1.58400492670630E-02+I*(1.41046538545878E-01):c := 7.31977111451906E-01+I*(3.17331470942358E-01):d := -6.52689114400833E-01+I*(-4.03424737940856E-01):e := -9.23251108915774E-02+I*(3.42499952294126E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.35331009558212E-02+I*(1.61396956037639E-01):b := 1.53844945126956E-01+I*(-1.84296316709139E-01):c := 4.54657252061670E-01+I*(4.32040896744240E-01):d := -6.59622985900529E-01+I*(-4.80691056910530E-01):e := -8.92878610731341E-02+I*(4.13037039637837E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.33339524425573E-02+I*(-6.40884476441702E-02):b := 4.68689184981606E-01+I*(-3.44815565950887E-01):c := 1.68484117189536E-01+I*(3.41655645417083E-01):d := -6.15268807152377E-01+I*(-5.44337497884670E-01):e := -1.55207325701610E-01+I*(4.91688325417766E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.81421643952237E-01+I*(-1.16704461555949E-01):b := 8.13053649899061E-01+I*(-2.65402468486411E-01):c := 7.36129710230097E-03+I*(8.84679805770401E-02):d := -5.40380391334426E-01+I*(-5.64583183780076E-01):e := -2.87331445394849E-01+I*(4.70309003298113E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.00773005944992E-01+I*(-8.74505214842198E-02):b := 9.80308592448844E-01+I*(1.24558336008718E-01):c := 3.92454513754124E-02+I*(-2.63139391817899E-03):d := -1.65978171971981E-01+I*(-5.73351551792117E-01):e := -2.06412894084130E-01+I*(4.80847083434726E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02615567016838E-01+I*(1.87123795730023E-01):b := 9.61900220161277E-01+I*(4.77481070578920E-01):c := 2.60607942588238E-01+I*(-2.05271972934499E-01):d := -1.33035826601984E-01+I*(-5.03116485745151E-01):e := -2.02985237196748E-01+I*(3.75663595444257E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.04138525955474E-01+I*(4.62923062050910E-01):b := 7.20944227905105E-01+I*(7.36002896625833E-01):c := 5.60436302308193E-01+I*(-2.18214595839413E-01):d := -1.52946756208498E-01+I*(-4.28138372249931E-01):e := -1.53017203953918E-01+I*(3.23790956215294E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.51420384723913E-01+I*(6.10897735599478E-01):b := 3.70186602384550E-01+I*(7.79158578592048E-01):c := 7.98437508801267E-01+I*(-3.54032655344807E-02):d := -2.16394415543299E-01+I*(-3.83500303899781E-01):e := -1.00535989207491E-01+I*(3.08347860037326E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.37289229746311E-01+I*(5.61808822067044E-01):b := 7.37507348174652E-02+I*(5.86755093263594E-01):c := 8.63248152460575E-01+I*(2.57622564808996E-01):d := -2.93690939661447E-01+I*(-3.90088928972606E-01):e := -5.22183104798523E-02+I*(3.14901149723449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.26899880194627E-01+I*(3.38625569657936E-01):b := -2.96577378438163E-02+I*(2.48820169752205E-01):c := 7.24542612827855E-01+I*(5.23752852553953E-01):d := -3.48668425872884E-01+I*(-4.44821356572421E-01):e := -8.23383915831535E-03+I*(3.41378925048841E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.28690635988616E-01+I*(4.57779025799366E-02):b := 1.08347158016076E-01+I*(-7.65226855028121E-02):c := 4.47222753437619E-01+I*(6.38462278355835E-01):d := -3.55602297372579E-01+I*(-5.22087675542095E-01):e := 2.56040636524722E-02+I*(3.95376656313449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41823582590238E-01+I*(-1.79707501101872E-01):b := 4.23191397870727E-01+I*(-2.37041934744560E-01):c := 1.61049618565486E-01+I*(5.48077027028678E-01):d := -3.11248118624427E-01+I*(-5.85734116516235E-01):e := 1.87452040761180E-02+I*(4.85850188322398E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.46264108919442E-01+I*(-2.32323515013651E-01):b := 7.67555862788182E-01+I*(-1.57628837280084E-01):c := -7.32015217498483E-05+I*(2.94889362188635E-01):d := -2.36359702806477E-01+I*(-6.05979802411641E-01):e := -8.96011517173217E-02+I*(5.55673196766746E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.94950377981860E-01+I*(-3.27176204747677E-01):b := 8.76179710667991E-01+I*(1.77872313486049E-01):c := -9.91348114572271E-02+I*(1.50717754806554E-01):d := 9.35244206073494E-02+I*(-4.09642469784606E-01):e := -5.10727056120961E-02+I*(6.68421606236149E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.96792939053706E-01+I*(-5.26018875334339E-02):b := 8.57771338380425E-01+I*(5.30795048056252E-01):c := 1.22227679755598E-01+I*(-5.19228242097661E-02):d := 1.26466765977346E-01+I*(-3.39407403737641E-01):e := -1.37775918953544E-01+I*(5.21746163262029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.98315897992342E-01+I*(2.23197378787452E-01):b := 6.16815346124252E-01+I*(7.89316874103164E-01):c := 4.22056039475554E-01+I*(-6.48654471146800E-02):d := 1.06555836370832E-01+I*(-2.64429290242421E-01):e := -1.02486691377345E-01+I*(4.18163891278581E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.55977567607810E-02+I*(3.71172052336021E-01):b := 2.66057720603697E-01+I*(8.32472556069380E-01):c := 6.60057245968627E-01+I*(1.17945883190252E-01):d := 4.31081770360309E-02+I*(-2.19791221892271E-01):e := -4.38967210552854E-02+I*(3.70346301962977E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.43111857709444E-01+I*(3.22083138803586E-01):b := -3.03781469633878E-02+I*(6.40069070740925E-01):c := 7.24867889627935E-01+I*(4.10971713533728E-01):d := -3.41883470821170E-02+I*(-2.26379846965096E-01):e := 1.60008124714936E-02+I*(3.53644158271451E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.32722508157759E-01+I*(9.88998863944787E-02):b := -1.33786619624669E-01+I*(3.02134147229537E-01):c := 5.86162349995216E-01+I*(6.77102001278685E-01):d := -8.91658332935539E-02+I*(-2.81112274564910E-01):e := 7.70292357486430E-02+I*(3.59594467319342E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.34513263951748E-01+I*(-1.93947780683521E-01):b := 4.21827623522336E-03+I*(-2.32087080254801E-02):c := 3.08842490604980E-01+I*(7.91811427080567E-01):d := -9.60997047932494E-02+I*(-3.58378593534584E-01):e := 1.40737521344289E-01+I*(3.94202348505777E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.47646210553370E-01+I*(-4.19433184365330E-01):b := 3.19062516089874E-01+I*(-1.83727957267228E-01):c := 2.26693557328460E-02+I*(7.01426175753410E-01):d := -5.17455260450977E-02+I*(-4.22025034508724E-01):e := 1.93968988064275E-01+I*(4.81637652716177E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.04414809563095E-02+I*(-4.72049198277108E-01):b := 6.63426981007329E-01+I*(-1.04314859802752E-01):c := -1.38453464354389E-01+I*(4.48238510913367E-01):d := 2.31428897728526E-02+I*(-4.42270720404130E-01):e := 1.53113217876313E-01+I*(6.36417548243739E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.67978240799846E-01+I*(-5.78838206363719E-01):b := 7.62142795266039E-01+I*(1.51780434653883E-01):c := -3.03711175593751E-01+I*(1.79240899670173E-01):d := 1.87084770120128E-01+I*(-1.17428986033116E-01):e := 2.55498763229999E-01+I*(1.08943849746344E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.69820801871692E-01+I*(-3.04263889149475E-01):b := 7.43734422978473E-01+I*(5.04703169224085E-01):c := -8.23486843809251E-02+I*(-2.33996793461465E-02):d := 2.20027115490124E-01+I*(-4.71939199861511E-02):e := -1.10762574986733E-01+I*(8.36856726776893E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.71343760810328E-01+I*(-2.84646228285892E-02):b := 5.02778430722301E-01+I*(7.63224995270998E-01):c := 2.17479675339030E-01+I*(-3.63423022510604E-02):d := 2.00116185883611E-01+I*(2.77841935090690E-02):e := -8.58312970650675E-02+I*(5.97967435843186E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.18625619578766E-01+I*(1.19510050719979E-01):b := 1.52020805201745E-01+I*(8.06380677237214E-01):c := 4.55480881832104E-01+I*(1.46469028053872E-01):d := 1.36668526548809E-01+I*(7.24222618592190E-02):e := 4.97147093441338E-04+I*(4.88892317862024E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.70083994891458E-01+I*(7.04211371875449E-02):b := -1.44415062365339E-01+I*(6.13977191908759E-01):c := 5.20291525491412E-01+I*(4.39494858397348E-01):d := 5.93720024306616E-02+I*(6.58336367863938E-02):e := 8.80428853092417E-02+I*(4.35811304901267E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.59694645339774E-01+I*(-1.52762115221563E-01):b := -2.47823535026621E-01+I*(2.76042268397371E-01):c := 3.81585985858692E-01+I*(7.05625146142305E-01):d := 4.39451621922467E-03+I*(1.11012091865795E-02):e := 1.79054522490265E-01+I*(4.12001467258727E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.61485401133763E-01+I*(-4.45609782299562E-01):b := -1.09818639166728E-01+I*(-4.93005868576466E-02):c := 1.04266126468456E-01+I*(8.20334571944187E-01):d := -2.53935528047075E-03+I*(-6.61651097830941E-02):e := 2.85807362152691E-01+I*(4.16264784122800E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.74618347735384E-01+I*(-6.71095185981372E-01):b := 2.05025600687923E-01+I*(-2.09819836099394E-01):c := -1.81907008403678E-01+I*(7.29949320617030E-01):d := 4.18148234676809E-02+I*(-1.29811550757234E-01):e := 4.24603225398410E-01+I*(4.78643389260456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.13469343774295E-01+I*(-7.23711199893150E-01):b := 5.49390065605377E-01+I*(-1.30406738634919E-01):c := -3.43029828490913E-01+I*(4.76761655776987E-01):d := 1.16703239285631E-01+I*(-1.50057236652640E-01):e := 5.58303057377973E-01+I*(7.17886645527927E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.85686045772124E-01+I*(-7.24681078864597E-01):b := 6.91556986338704E-01+I*(5.84913795967219E-02):c := -4.78760086641648E-01+I*(6.95917441915476E-02):d := 7.09249492218646E-02+I*(1.66558962823906E-01):e := 1.27190278871127E+00+I*(4.84937620706814E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.87528606843970E-01+I*(-4.50106761650354E-01):b := 6.73148614051138E-01+I*(4.11414114166924E-01):c := -2.57397595428823E-01+I*(-1.33048834824772E-01):d := 1.03867294591861E-01+I*(2.36794028870872E-01):e := -9.01366336809508E-01+I*(1.45111616876737E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89051565782606E-01+I*(-1.74307495329468E-01):b := 4.32192621794965E-01+I*(6.69935940213837E-01):c := 4.24307642911327E-02+I*(-1.45991457729686E-01):d := 8.39563649853474E-02+I*(3.11772142366092E-01):e := -3.61375197188715E-01+I*(8.94009009408695E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36333424551045E-01+I*(-2.63328217808991E-02):b := 8.14349962744105E-02+I*(7.13091622180053E-01):c := 2.80431970784206E-01+I*(3.68198725752459E-02):d := 2.05087056505461E-02+I*(3.56410210716242E-01):e := -7.98650316409703E-02+I*(7.21984729681581E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.76238100808202E-02+I*(-7.54217353133336E-02):b := -2.15000871292674E-01+I*(5.20688136851598E-01):c := 3.45242614443514E-01+I*(3.29845702918722E-01):d := -5.67878184676018E-02+I*(3.49821585643417E-01):e := 1.20710821368001E-01+I*(6.31600569022452E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41986840367495E-01+I*(-2.98604987722441E-01):b := -3.18409343953956E-01+I*(1.82753213340209E-01):c := 2.06537074810794E-01+I*(5.95975990663680E-01):d := -1.11765304679039E-01+I*(2.95089158043602E-01):e := 3.05725867102210E-01+I*(5.68466845090620E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43777596161484E-01+I*(-5.91452654800441E-01):b := -1.80404448094063E-01+I*(-1.42589641914808E-01):c := -7.07827845794410E-02+I*(7.10685416465561E-01):d := -1.18699176178734E-01+I*(2.17822839073928E-01):e := 5.23222506421985E-01+I*(5.16736071301758E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.30894572368943E-02+I*(-8.16938058482250E-01):b := 1.34439791760587E-01+I*(-3.03108891156556E-01):c := -3.56955919451575E-01+I*(6.20300165138404E-01):d := -7.43449974305826E-02+I*(1.54176398099788E-01):e := 8.63778779326330E-01+I*(4.80953125991299E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.31177148746574E-01+I*(-8.69554072394028E-01):b := 4.78804256678042E-01+I*(-2.23695793692080E-01):c := -5.18078739538810E-01+I*(3.67112500298361E-01):d := 5.43418387367812E-04+I*(1.33930712204382E-01):e := 1.69074454592310E+00+I*(6.18741839005615E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.46205891399426E-01+I*(-6.96463321344170E-01):b := 6.97450168356970E-01+I*(-5.83438660318292E-02):c := -5.42374213669665E-01+I*(-1.26923653166252E-01):d := -2.00602570916534E-01+I*(3.09440259341774E-01):e := -1.65315696496818E+00+I*(-7.47694866214249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.48048452471272E-01+I*(-4.21889004129927E-01):b := 6.79041796069404E-01+I*(2.94578868538373E-01):c := -3.21011722456839E-01+I*(-3.29564232182572E-01):d := -1.67660225546538E-01+I*(3.79675325388739E-01):e := -1.15130943022031E+00+I*(1.03148714294958E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.49571411409908E-01+I*(-1.46089737809041E-01):b := 4.38085803813231E-01+I*(5.53100694585286E-01):c := -2.11833627368841E-02+I*(-3.42506855087486E-01):d := -1.87571155153052E-01+I*(4.54653438883959E-01):e := -7.98231489858169E-01+I*(4.59048424374673E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.96853270178348E-01+I*(1.88493573952742E-03):b := 8.73281782926763E-02+I*(5.96256376551501E-01):c := 2.16817843756190E-01+I*(-1.59695524782554E-01):d := -2.51018814487853E-01+I*(4.99291507234110E-01):e := -5.04756261548928E-01+I*(6.79747678628116E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.08143655708123E-01+I*(-4.72039777929069E-02):b := -2.09107689274408E-01+I*(4.03852891223046E-01):c := 2.81628487415497E-01+I*(1.33330305560923E-01):d := -3.28315338606001E-01+I*(4.92702882161284E-01):e := -2.01519307227591E-01+I*(8.55532570886179E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.18533005259807E-01+I*(-2.70387230202015E-01):b := -3.12516161935690E-01+I*(6.59179677116580E-02):c := 1.42922947782778E-01+I*(3.99460593305880E-01):d := -3.83292824817438E-01+I*(4.37970454561470E-01):e := 1.95787210587469E-01+I*(1.02134412047799E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.16742249465818E-01+I*(-5.63234897280014E-01):b := -1.74511266075797E-01+I*(-2.59424887543359E-01):c := -1.34396911607458E-01+I*(5.14170019107761E-01):d := -3.90226696317133E-01+I*(3.60704135591796E-01):e := 9.04085252993632E-01+I*(1.16723543079040E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03609302864197E-01+I*(-7.88720300961823E-01):b := 1.40332973778853E-01+I*(-4.19944136785107E-01):c := -4.20570046479592E-01+I*(4.23784767780605E-01):d := -3.45872517568982E-01+I*(2.97057694617656E-01):e := 2.88513854674177E+00+I*(6.27632015111643E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.91696994373876E-01+I*(-8.41336314873602E-01):b := 4.84697438696308E-01+I*(-3.40531039320632E-01):c := -5.81692866566827E-01+I*(1.70597102940562E-01):d := -2.70984101751031E-01+I*(2.76812008722250E-01):e := -5.82882373995463E-01+I*(-4.28403452699771E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.71194596020977E-01+I*(-5.14621747176766E-01):b := 9.53911961474740E-01+I*(4.79449284510928E-02):c := -9.23806551034259E-01+I*(-2.45445494307451E-01):d := -2.69823367740231E-01+I*(2.43283493806539E-01):e := -2.21293709993805E+00+I*(1.20893398002628E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07303715709282E+00+I*(-2.40047429962523E-01):b := 9.35503589187173E-01+I*(4.00867663021295E-01):c := -7.02444059821433E-01+I*(-4.48086073323770E-01):d := -2.36881022370235E-01+I*(3.13518559853504E-01):e := -9.49615027357072E-01+I*(6.63653202427610E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.74560116031458E-01+I*(3.57518363583637E-02):b := 6.94547596931001E-01+I*(6.59389489068208E-01):c := -4.02615700101478E-01+I*(-4.61028696228684E-01):d := -2.56791951976748E-01+I*(3.88496673348725E-01):e := -5.11613120203338E-01+I*(6.22986055582690E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.21841974799898E-01+I*(1.83726509906932E-01):b := 3.43789971410446E-01+I*(7.02545171034423E-01):c := -1.64614493608405E-01+I*(-2.78217365923752E-01):d := -3.20239611311549E-01+I*(4.33134741698875E-01):e := -2.53788675439724E-01+I*(6.30106626485756E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.33132360329673E-01+I*(1.34637596374498E-01):b := 4.73541038433615E-02+I*(5.10141685705969E-01):c := -9.98038499490971E-02+I*(1.48084644197238E-02):d := -3.97536135429697E-01+I*(4.26546116626049E-01):e := -4.56741523371170E-02+I*(6.52682744897730E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43521709881357E-01+I*(-8.85456560346100E-02):b := -5.60543688179207E-02+I*(1.72206762194580E-01):c := -2.38509389581817E-01+I*(2.80938752164681E-01):d := -4.52513621641134E-01+I*(3.71813689026235E-01):e := 1.70456217934223E-01+I*(6.92442553265424E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.41730954087368E-01+I*(-3.81393323112610E-01):b := 8.19505270419721E-02+I*(-1.53136093060437E-01):c := -5.15829248972052E-01+I*(3.95648177966563E-01):d := -4.59447493140830E-01+I*(2.94547370056561E-01):e := 4.62021677678949E-01+I*(7.73726769103082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.28598007485747E-01+I*(-6.06878726794419E-01):b := 3.96794766896623E-01+I*(-3.13655342302185E-01):c := -8.02002383844186E-01+I*(3.05262926639406E-01):d := -4.15093314392678E-01+I*(2.30900929082422E-01):e := 1.02194572411140E+00+I*(1.03068182497252E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.16685698995426E-01+I*(-6.59494740706197E-01):b := 7.41159231814077E-01+I*(-2.34242244837709E-01):c := -9.63125203931421E-01+I*(5.20752617993630E-02):d := -3.40204898574728E-01+I*(2.10655243187015E-01):e := 2.43546904666771E+00+I*(3.72469280288376E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.88644326081493E-01+I*(-2.53159821218185E-01):b := 1.06999555751295E+00+I*(3.34603523019269E-02):c := -7.41323141362310E-01+I*(-3.42217720440419E-01):d := -4.57684235369917E-01+I*(6.92163581081263E-04):e := -7.31004201110081E-01+I*(5.63845020437746E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09048688715334E+00+I*(2.14144959960576E-02):b := 1.05158718522539E+00+I*(3.86383086872129E-01):c := -5.19960650149485E-01+I*(-5.44858299456739E-01):d := -4.24741889999921E-01+I*(7.09272296280465E-02):e := -5.04118652597297E-01+I*(4.00043045914047E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.92009846091975E-01+I*(2.97213762316944E-01):b := 8.10631192969215E-01+I*(6.44904912919042E-01):c := -2.20132290429530E-01+I*(-5.57800922361653E-01):d := -4.44652819606434E-01+I*(1.45905343123267E-01):e := -3.47965931515433E-01+I*(3.83688858187476E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.39291704860414E-01+I*(4.45188435865512E-01):b := 4.59873567448661E-01+I*(6.88060594885258E-01):c := 1.78689160635432E-02+I*(-3.74989592056721E-01):d := -5.08100478941235E-01+I*(1.90543411473417E-01):e := -2.35622812809105E-01+I*(4.08458390108066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.50582090390189E-01+I*(3.96099522333078E-01):b := 1.63437699881576E-01+I*(4.95657109556803E-01):c := 8.26795597228512E-02+I*(-8.19637617132450E-02):d := -5.85397003059383E-01+I*(1.83954786400592E-01):e := -1.41227344444927E-01+I*(4.57365019009603E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.60971439941874E-01+I*(1.72916269923970E-01):b := 6.00292272202937E-02+I*(1.57722186045414E-01):c := -5.60259799098685E-02+I*(1.84166526031712E-01):d := -6.40374489270820E-01+I*(1.29222358800777E-01):e := -5.14592780194849E-02+I*(5.40628708020555E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.59180684147885E-01+I*(-1.19931397154029E-01):b := 1.98034123080186E-01+I*(-1.67620669209603E-01):c := -3.33345839300104E-01+I*(2.98875951833594E-01):d := -6.47308360770515E-01+I*(5.19560398311036E-02):e := 2.91550932160633E-02+I*(7.00951384546487E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46047737546263E-01+I*(-3.45416800835838E-01):b := 5.12878362934837E-01+I*(-3.28139918451351E-01):c := -6.19518974172238E-01+I*(2.08490700506437E-01):d := -6.02954182022364E-01+I*(-1.16904011430365E-02):e := -2.66108212788671E-02+I*(1.04024250268784E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.34135429055943E-01+I*(-3.98032814747617E-01):b := 8.57242827852292E-01+I*(-2.48726820986875E-01):c := -7.80641794259473E-01+I*(-4.46969643336057E-02):d := -5.28065766204414E-01+I*(-3.19360870384425E-02):e := -6.61601903301760E-01+I*(1.12834961805166E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.33947108417322E-01+I*(-4.16518954751547E-02):b := 1.16823125727554E+00+I*(9.69816204531462E-02):c := -5.39328751501654E-01+I*(-2.99051471807352E-01):d := -4.45659307810847E-01+I*(-3.05898214944297E-01):e := -3.47899106065166E-01+I*(4.97068781333078E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.35789669489169E-01+I*(2.32922421739088E-01):b := 1.14982288498797E+00+I*(4.49904355023348E-01):c := -3.17966260288829E-01+I*(-5.01692050823671E-01):d := -4.12716962440851E-01+I*(-2.35663148897331E-01):e := -2.93838166166451E-01+I*(3.72687405762343E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.37312628427805E-01+I*(5.08721688059974E-01):b := 9.08866892731802E-01+I*(7.08426181070261E-01):c := -1.81379005688742E-02+I*(-5.14634673728585E-01):d := -4.32627892047365E-01+I*(-1.60685035402111E-01):e := -2.16103826725096E-01+I*(3.30764927239024E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.84594487196244E-01+I*(6.56696361608543E-01):b := 5.58109267211248E-01+I*(7.51581863036477E-01):c := 2.19863305924199E-01+I*(-3.31823343423654E-01):d := -4.96075551382166E-01+I*(-1.16046967051961E-01):e := -1.49066383208505E-01+I*(3.28229232684314E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.95884872726019E-01+I*(6.07607448076109E-01):b := 2.61673399644163E-01+I*(5.59178377708022E-01):c := 2.84673949583507E-01+I*(-3.87975130801778E-02):d := -5.73372075500314E-01+I*(-1.22635592124786E-01):e := -9.13529882031464E-02+I*(3.48511998731466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06274222277704E-01+I*(3.84424195667001E-01):b := 1.58264926982881E-01+I*(2.21243454196634E-01):c := 1.45968409950788E-01+I*(2.27332774664779E-01):d := -6.28349561711751E-01+I*(-1.77368019724601E-01):e := -4.07383158489974E-02+I*(3.92304358986471E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04483466483714E-01+I*(9.15765285890015E-02):b := 2.96269822842774E-01+I*(-1.04099401058383E-01):c := -1.31351449439448E-01+I*(3.42042200466661E-01):d := -6.35283433211446E-01+I*(-2.54634338694275E-01):e := -6.30656154117989E-03+I*(4.73193497183862E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.91350519882093E-01+I*(-1.33908875092807E-01):b := 6.11114062697424E-01+I*(-2.64618650300131E-01):c := -4.17524584311581E-01+I*(2.51656949139505E-01):d := -5.90929254463294E-01+I*(-3.18280779668415E-01):e := -4.09675173650242E-02+I*(6.03484522949190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.79438211391772E-01+I*(-1.86524889004586E-01):b := 9.55478527614879E-01+I*(-1.85205552835656E-01):c := -5.78647404398817E-01+I*(-1.53071570053820E-03):d := -5.16040838645344E-01+I*(-3.38526465563821E-01):e := -2.32105688737713E-01+I*(6.60076596764668E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.79487490441597E-01+I*(2.09351209484056E-02):b := 1.20265348507540E+00+I*(2.08786425576536E-01):c := -4.12338801385674E-01+I*(-1.36144715883077E-01):d := -2.39375182310095E-01+I*(-5.33030596285059E-01):e := -1.40055873137772E-01+I*(4.75805321273411E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.81330051513444E-01+I*(2.95509438162649E-01):b := 1.18424511278783E+00+I*(5.61709160146738E-01):c := -1.90976310172849E-01+I*(-3.38785294899396E-01):d := -2.06432836940099E-01+I*(-4.62795530238094E-01):e := -1.58139515665334E-01+I*(3.81122084720794E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.82853010452079E-01+I*(5.71308704483535E-01):b := 9.43289120531657E-01+I*(8.20230986193651E-01):c := 1.08852049547106E-01+I*(-3.51727917804310E-01):d := -2.26343766546612E-01+I*(-3.87817416742873E-01):e := -1.21200255064856E-01+I*(3.24779463780458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.30134869220519E-01+I*(7.19283378032103E-01):b := 5.92531495011102E-01+I*(8.63386668159867E-01):c := 3.46853256040179E-01+I*(-1.68916587499378E-01):d := -2.89791425881414E-01+I*(-3.43179348392723E-01):e := -7.51453787787047E-02+I*(3.02955361115776E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.14252547502939E-02+I*(6.70194464499669E-01):b := 2.96095627444017E-01+I*(6.70983182831412E-01):c := 4.11663899699488E-01+I*(1.24109242844098E-01):d := -3.67087949999562E-01+I*(-3.49767973465549E-01):e := -3.03927935168882E-02+I*(3.02885643901079E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.48185395698022E-01+I*(4.47011212090561E-01):b := 1.92687154782735E-01+I*(3.33048259320024E-01):c := 2.72958360066768E-01+I*(3.90239530589055E-01):d := -4.22065436210999E-01+I*(-4.04500401065363E-01):e := 1.17929970926946E-02+I*(3.21562069302855E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.49976151492011E-01+I*(1.54163545012562E-01):b := 3.30692050642628E-01+I*(7.70540406500670E-03):c := -4.36149932346774E-03+I*(5.04948956390937E-01):d := -4.28999307710694E-01+I*(-4.81766720035037E-01):e := 4.70184753623655E-02+I*(3.64759964640808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.68909019063678E-02+I*(-7.13218586692474E-02):b := 6.45536290497279E-01+I*(-1.52813845176741E-01):c := -2.90534634195601E-01+I*(4.14563705063780E-01):d := -3.84645128962542E-01+I*(-5.45413161009177E-01):e := 5.21663318164393E-02+I*(4.41618212471304E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.24978593416047E-01+I*(-1.23937872581026E-01):b := 9.89900755414733E-01+I*(-7.34007477122655E-02):c := -4.51657454282837E-01+I*(1.61376040223737E-01):d := -3.09756713144592E-01+I*(-5.65658846904583E-01):e := -2.62717013253609E-02+I*(5.16244671974521E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.44329955408803E-01+I*(-9.46839325092969E-02):b := 1.15715569796452E+00+I*(3.16560056782863E-01):c := -4.19773300009725E-01+I*(7.02766657285182E-02):d := 6.46455062178540E-02+I*(-5.74427214916624E-01):e := 2.04465360277775E-02+I*(4.66439684003718E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46172516480649E-01+I*(1.79890384704946E-01):b := 1.13874732567695E+00+I*(6.69482791353065E-01):c := -1.98410808796900E-01+I*(-1.32363913287802E-01):d := 9.75878515878500E-02+I*(-5.04192148869658E-01):e := -4.39562546013133E-02+I*(4.04368183625690E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.47695475419285E-01+I*(4.55689651025833E-01):b := 8.97791333420778E-01+I*(9.28004617399978E-01):c := 1.01417550923055E-01+I*(-1.45306536192715E-01):d := 7.76769219813367E-02+I*(-4.29214035374438E-01):e := -4.02731284393248E-02+I*(3.39058698390566E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.49773341877241E-02+I*(6.03664324574401E-01):b := 5.47033707900223E-01+I*(9.71160299366194E-01):c := 3.39418757416129E-01+I*(3.75047941122160E-02):d := 1.42292626465353E-02+I*(-3.84575967024288E-01):e := -9.83165676781466E-03+I*(3.01322311451661E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.93732280282501E-01+I*(5.54575411041967E-01):b := 2.50597840333138E-01+I*(7.78756814037740E-01):c := 4.04229401075437E-01+I*(3.30530624455692E-01):d := -6.30672614716124E-02+I*(-3.91164592097113E-01):e := 2.75069151063180E-02+I*(2.85171677106665E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.83342930730816E-01+I*(3.31392158632859E-01):b := 1.47189367671856E-01+I*(4.40821890526351E-01):c := 2.65523861442717E-01+I*(5.96660912200649E-01):d := -1.18044747683049E-01+I*(-4.45897019696928E-01):e := 6.71660379963947E-02+I*(2.86234254305610E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.85133686524806E-01+I*(3.85444915548598E-02):b := 2.85194263531749E-01+I*(1.15479035271334E-01):c := -1.17959979475184E-02+I*(7.11370338002531E-01):d := -1.24978619182745E-01+I*(-5.23163338666602E-01):e := 1.07007145790811E-01+I*(3.07279298531568E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.98266633126427E-01+I*(-1.86940912126949E-01):b := 6.00038503386399E-01+I*(-4.50402139704138E-02):c := -2.97969132819652E-01+I*(6.20985086675375E-01):d := -8.06244404345927E-02+I*(-5.86809779640742E-01):e := 1.36162384427692E-01+I*(3.58270430983859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.98210583832523E-02+I*(-2.39556926038728E-01):b := 9.44402968303854E-01+I*(3.43728834940614E-02):c := -4.59091952906887E-01+I*(3.67797421835332E-01):d := -5.73602461664280E-03+I*(-6.07055465536148E-01):e := 1.15525909258336E-01+I*(4.37263158745707E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.38507327445670E-01+I*(-3.34409615772754E-01):b := 1.05302681618366E+00+I*(3.69874034260195E-01):c := -5.58153562842365E-01+I*(2.23625814453250E-01):d := 3.24148098797184E-01+I*(-4.10718132909113E-01):e := 1.81689708654791E-01+I*(4.63174039113802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.40349888517517E-01+I*(-5.98352985585109E-02):b := 1.03461844389610E+00+I*(7.22796768830398E-01):c := -3.36791071629540E-01+I*(2.09852354369309E-02):d := 3.57090444167180E-01+I*(-3.40483066862148E-01):e := 7.68556301971851E-02+I*(4.46450259784575E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.41872847456153E-01+I*(2.15963967762375E-01):b := 7.93662451639925E-01+I*(9.81318594877310E-01):c := -3.69627119095847E-02+I*(8.04261253201699E-03):d := 3.37179514560667E-01+I*(-2.65504953366927E-01):e := 4.17795586440677E-02+I*(3.74177511510346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08452937754083E-02+I*(3.63938641310944E-01):b := 4.42904826119370E-01+I*(1.02447427684353E+00):c := 2.01038494583489E-01+I*(1.90853942836948E-01):d := 2.73731855225865E-01+I*(-2.20866885016777E-01):e := 5.56256844615071E-02+I*(3.18533126084486E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.99554908245633E-01+I*(3.14849727778509E-01):b := 1.46468958552285E-01+I*(8.32070791515071E-01):c := 2.65849138242797E-01+I*(4.83879773180425E-01):d := 1.96435331107717E-01+I*(-2.27455510089603E-01):e := 8.68684392898649E-02+I*(2.85520448777737E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.89165558693948E-01+I*(9.16664753694017E-02):b := 4.30604858910031E-02+I*(4.94135868003683E-01):c := 1.27143598610077E-01+I*(7.50010060925382E-01):d := 1.41457844896280E-01+I*(-2.82187937689417E-01):e := 1.25793906935013E-01+I*(2.70071617173679E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.90956314487938E-01+I*(-2.01181191708598E-01):b := 1.81065381750896E-01+I*(1.68793012748666E-01):c := -1.50176260780158E-01+I*(8.64719486727264E-01):d := 1.34523973396585E-01+I*(-3.59454256659091E-01):e := 1.70868356117352E-01+I*(2.72586756208748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.04089261089560E-01+I*(-4.26666595390407E-01):b := 4.95909621605546E-01+I*(8.27376350691791E-03):c := -4.36349395652292E-01+I*(7.74334235400107E-01):d := 1.78878152144737E-01+I*(-4.23100697633231E-01):e := 2.18696162621866E-01+I*(3.02864507015110E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.60015695798801E-02+I*(-4.79282609302185E-01):b := 8.40274086523001E-01+I*(8.76868609713935E-02):c := -5.97472215739527E-01+I*(5.21146570560064E-01):d := 2.53766567962687E-01+I*(-4.43346383528637E-01):e := 2.43661295056474E-01+I*(3.77944843132974E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.11535190263656E-01+I*(-5.86071617388796E-01):b := 9.38989900781712E-01+I*(3.43782155428029E-01):c := -7.62729926978889E-01+I*(2.52148959316870E-01):d := 4.17708448309962E-01+I*(-1.18504649157623E-01):e := 3.92714923796061E-01+I*(4.68182277925144E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.13377751335502E-01+I*(-3.11497300174552E-01):b := 9.20581528494146E-01+I*(6.96704889998231E-01):c := -5.41367435766063E-01+I*(4.95083803005505E-02):d := 4.50650793679958E-01+I*(-4.82695831106581E-02):e := 2.38128958067388E-01+I*(5.36019834094564E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.14900710274138E-01+I*(-3.56980338536662E-02):b := 6.79625536237973E-01+I*(9.55226716045144E-01):c := -2.41539076046108E-01+I*(3.65657573956364E-02):d := 4.30739864073445E-01+I*(2.67085303845621E-02):e := 1.37169953424308E-01+I*(4.52948290473532E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.21825690425772E-02+I*(1.12276639694902E-01):b := 3.28867910717418E-01+I*(9.98382398011360E-01):c := -3.53786955303454E-03+I*(2.19377087700568E-01):d := 3.67292204738644E-01+I*(7.13465987347122E-02):e := 1.28299823092065E-01+I*(3.66786836429107E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.26527045427648E-01+I*(6.31877261624679E-02):b := 3.24320431503334E-02+I*(8.05978912682905E-01):c := 6.12727741062734E-02+I*(5.12402918044045E-01):d := 2.89995680620496E-01+I*(6.47579736618870E-02):e := 1.54457534728092E-01+I*(3.09192022814516E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.16137695875963E-01+I*(-1.59995526246640E-01):b := -7.09764295109484E-02+I*(4.68043989171517E-01):c := -7.74327655264461E-02+I*(7.78533205789001E-01):d := 2.35018194409059E-01+I*(1.00255460620726E-02):e := 1.95109009953136E-01+I*(2.72753715602150E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.17928451669952E-01+I*(-4.52843193324639E-01):b := 6.70284663489441E-02+I*(1.42701133916499E-01):c := -3.54752624916682E-01+I*(8.93242631590883E-01):d := 2.28084322909364E-01+I*(-6.72407729076010E-02):e := 2.47898821402034E-01+I*(2.53914110969427E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.31061398271574E-01+I*(-6.78328597006448E-01):b := 3.81872706203595E-01+I*(-1.78181153252485E-02):c := -6.40925759788815E-01+I*(8.02857380263727E-01):d := 2.72438501657515E-01+I*(-1.30887213881741E-01):e := 3.16033134530590E-01+I*(2.60381244723194E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.70262932381059E-02+I*(-7.30944610918227E-01):b := 7.26237171121049E-01+I*(6.15949821392271E-02):c := -8.02048579876051E-01+I*(5.49669715423684E-01):d := 3.47326917475466E-01+I*(-1.51132899777147E-01):e := 3.91904305521644E-01+I*(3.22166347563995E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.29242995235934E-01+I*(-7.31914489889674E-01):b := 8.68404091854377E-01+I*(2.50493100370868E-01):c := -9.37778838026786E-01+I*(1.42499803838244E-01):d := 3.01548627411699E-01+I*(1.65483299699399E-01):e := 7.88368966036894E-01+I*(5.06129228177353E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.31085556307780E-01+I*(-4.57340172675431E-01):b := 8.49995719566811E-01+I*(6.03415834941070E-01):c := -7.16416346813960E-01+I*(-6.01407751780750E-02):d := 3.34490972781695E-01+I*(2.35718365746364E-01):e := 5.05210806850257E-01+I*(8.26143627317035E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.32608515246416E-01+I*(-1.81540906354545E-01):b := 6.09039727310638E-01+I*(8.61937660987983E-01):c := -4.16587987094006E-01+I*(-7.30833980829893E-02):d := 3.14580043175182E-01+I*(3.10696479241585E-01):e := 2.27199890336144E-01+I*(6.65872531362953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.79890374014856E-01+I*(-3.35662328059760E-02):b := 2.58282101790083E-01+I*(9.05093342954199E-01):c := -1.78586780600932E-01+I*(1.09727932221943E-01):d := 2.51132383840381E-01+I*(3.55334547591735E-01):e := 1.95884672880343E-01+I*(4.92916575169816E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.81924045536923E-03+I*(-8.26551463384105E-02):b := -3.81537657770016E-02+I*(7.12689857625744E-01):c := -1.13776136941624E-01+I*(4.02753762565419E-01):d := 1.73835859722233E-01+I*(3.48745922518910E-01):e := 2.30153240691090E-01+I*(3.86001213570927E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.98429890903684E-01+I*(-3.05838398747518E-01):b := -1.41562238438284E-01+I*(3.74754934114355E-01):c := -2.52481676574344E-01+I*(6.68884050310376E-01):d := 1.18858373510796E-01+I*(2.94013494919095E-01):e := 2.84580272985145E-01+I*(3.14584982683970E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.00220646697674E-01+I*(-5.98686065825518E-01):b := -3.55734257839094E-03+I*(4.94120788593381E-02):c := -5.29801535964579E-01+I*(7.83593476112257E-01):d := 1.11924502011100E-01+I*(2.16747175949422E-01):e := 3.56723100117290E-01+I*(2.63197280967124E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.33535932992952E-02+I*(-8.24171469507327E-01):b := 3.11286897276260E-01+I*(-1.11107170382410E-01):c := -8.15974670836713E-01+I*(6.93208224785101E-01):d := 1.56278680759252E-01+I*(1.53100734975282E-01):e := 4.59907637379639E-01+I*(2.32637764961116E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.74734098210384E-01+I*(-8.76787483419105E-01):b := 6.55651362193714E-01+I*(-3.16940729179344E-02):c := -9.77097490923948E-01+I*(4.40020559945058E-01):d := 2.31167096577202E-01+I*(1.32855049079875E-01):e := 6.20979025328310E-01+I*(2.60597563306330E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.89762840863237E-01+I*(-7.03696732369247E-01):b := 8.74297273872642E-01+I*(1.33657854742316E-01):c := -1.00139296505480E+00+I*(-5.40155935195552E-02):d := 3.00211072732999E-02+I*(3.08364596217267E-01):e := 2.40135564151863E+00+I*(1.08854805988796E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.91605401935083E-01+I*(-4.29122415155004E-01):b := 8.55888901585076E-01+I*(4.86580589312519E-01):c := -7.80030473841977E-01+I*(-2.56656172535875E-01):d := 6.29634526432962E-02+I*(3.78599662264232E-01):e := -6.60034875198960E-02+I*(2.16757434911746E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.93128360873719E-01+I*(-1.53323148834118E-01):b := 6.14932909328904E-01+I*(7.45102415359432E-01):c := -4.80202114122022E-01+I*(-2.69598795440789E-01):d := 4.30525230367829E-02+I*(4.53577775759453E-01):e := -1.08482924446511E-01+I*(1.06994783227010E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.40410219642158E-01+I*(-5.34847528554930E-03):b := 2.64175283808349E-01+I*(7.88258097325647E-01):c := -2.42200907628949E-01+I*(-8.67874651358572E-02):d := -2.03951362980184E-02+I*(4.98215844109603E-01):e := 7.99437535160860E-02+I*(7.42150048371832E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.51700605171933E-01+I*(-5.44373888179840E-02):b := -3.22605837587360E-02+I*(5.95854611997192E-01):c := -1.77390263969641E-01+I*(2.06238365207619E-01):d := -9.76916604161663E-02+I*(4.91627219036777E-01):e := 2.28512335377217E-01+I*(5.80707016351483E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.20899547236179E-02+I*(-2.77620641227092E-01):b := -1.35669056420018E-01+I*(2.57919688485804E-01):c := -3.16095803602360E-01+I*(4.72368652952576E-01):d := -1.52669146627603E-01+I*(4.36894791436963E-01):e := 3.64509843936595E-01+I*(4.70623048932113E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.02991989296286E-02+I*(-5.70468308305091E-01):b := 2.33583943987473E-03+I*(-6.74231667692131E-02):c := -5.93415662992596E-01+I*(5.87078078754457E-01):d := -1.59603018127299E-01+I*(3.59628472467289E-01):e := 5.17682148885500E-01+I*(3.76947908615736E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.47166252328007E-01+I*(-7.95953711986900E-01):b := 3.17180079294526E-01+I*(-2.27942416010961E-01):c := -8.79588797864729E-01+I*(4.96692827427301E-01):d := -1.15248839379147E-01+I*(2.95982031493149E-01):e := 7.38129374924629E-01+I*(2.85410028370316E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.35253943837686E-01+I*(-8.48569725898679E-01):b := 6.61544544211980E-01+I*(-1.48529318546486E-01):c := -1.04071161795196E+00+I*(2.43505162587258E-01):d := -4.03604235611968E-02+I*(2.75736345597743E-01):e := 1.18246161731362E+00+I*(2.23818000869753E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.32606257787734E-01+I*(-5.56443755034896E-01):b := 9.65968376784580E-01+I*(3.08701907953811E-01):c := -1.32229971220744E+00+I*(-4.84646246360664E-01):d := -9.24639576826189E-02+I*(3.90701530888104E-01):e := 1.80282098733272E+00+I*(-1.99945157568410E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03444881885958E+00+I*(-2.81869437820652E-01):b := 9.47560004497014E-01+I*(6.61624642524013E-01):c := -1.10093722099461E+00+I*(-6.87286825376984E-01):d := -5.95216123126229E-02+I*(4.60936596935069E-01):e := 1.98723936734281E+00+I*(2.56812435390954E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.35971777798216E-01+I*(-6.07017149976565E-03):b := 7.06604012240842E-01+I*(9.20146468570927E-01):c := -8.01108861274659E-01+I*(-7.00229448281898E-01):d := -7.94325419191361E-02+I*(5.35914710430290E-01):e := 2.12006033093430E-01+I*(1.38036555895318E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.83253636566655E-01+I*(1.41904502048803E-01):b := 3.55846386720287E-01+I*(9.63302150537142E-01):c := -5.63107654781585E-01+I*(-5.17418117976966E-01):d := -1.42880201253937E-01+I*(5.80552778780440E-01):e := 2.54009417723597E-01+I*(8.18324264918322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.94544022096431E-01+I*(9.28155885163681E-02):b := 5.94105191532023E-02+I*(7.70898665208687E-01):c := -4.98297011122278E-01+I*(-2.24392287633490E-01):d := -2.20176725372085E-01+I*(5.73964153707615E-01):e := 3.51498099787803E-01+I*(5.67268097634453E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.04933371648115E-01+I*(-1.30367663892739E-01):b := -4.39979535080798E-02+I*(4.32963741697299E-01):c := -6.37002550754997E-01+I*(4.17380001114670E-02):d := -2.75154211583522E-01+I*(5.19231726107800E-01):e := 4.47771335494831E-01+I*(4.03979272728611E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.03142615854126E-01+I*(-4.23215330970739E-01):b := 9.40069423518128E-02+I*(1.07620886442282E-01):c := -9.14322410145232E-01+I*(1.56447425913349E-01):d := -2.82088083083218E-01+I*(4.41965407138126E-01):e := 5.55207010361344E-01+I*(2.66002824734770E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.90009669252505E-01+I*(-6.48700734652548E-01):b := 4.08851182206464E-01+I*(-5.28983627994664E-02):c := -1.20049554501737E+00+I*(6.60621745861921E-02):d := -2.37733904335066E-01+I*(3.78318966163986E-01):e := 7.03135259927658E-01+I*(1.21349192105047E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.78097360762184E-01+I*(-7.01316748564327E-01):b := 7.53215647123918E-01+I*(2.65147346650092E-02):c := -1.36161836510460E+00+I*(-1.87125490253851E-01):d := -1.62845488517116E-01+I*(3.58073280268580E-01):e := 9.77693370977513E-01+I*(-6.02833490046567E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.50055987848250E-01+I*(-2.94981829076316E-01):b := 1.08205197282279E+00+I*(2.94217331804645E-01):c := -1.13981630253549E+00+I*(-5.81418472493633E-01):d := -2.80324825312305E-01+I*(1.48110200662647E-01):e := 2.24981026081156E-01+I*(2.41408042293473E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05189854892010E+00+I*(-2.04075118620721E-02):b := 1.06364360053523E+00+I*(6.47140066374847E-01):c := -9.18453811322666E-01+I*(-7.84059051509952E-01):d := -2.47382479942309E-01+I*(2.18345266709612E-01):e := -5.22808401351228E-01+I*(1.16374195759848E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.53421507858733E-01+I*(2.55391754458814E-01):b := 8.22687608279056E-01+I*(9.05661892421760E-01):c := -6.18625451602711E-01+I*(-7.97001674414866E-01):d := -2.67293409548822E-01+I*(2.93323380204832E-01):e := -2.58480040959240E-01+I*(7.60145194498535E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.00703366627172E-01+I*(4.03366428007383E-01):b := 4.71929982758501E-01+I*(9.48817574387976E-01):c := -3.80624245109637E-01+I*(-6.14190344109935E-01):d := -3.30741068883623E-01+I*(3.37961448554982E-01):e := -6.43865228341371E-02+I*(6.23848952452680E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.11993752156947E-01+I*(3.54277514474948E-01):b := 1.75494115191416E-01+I*(7.56414089059521E-01):c := -3.15813601450329E-01+I*(-3.21164513766459E-01):d := -4.08037593001771E-01+I*(3.31372823482157E-01):e := 8.95017753908833E-02+I*(5.58656093591265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.22383101708632E-01+I*(1.31094262065841E-01):b := 7.20856425301343E-02+I*(4.18479165548133E-01):c := -4.54519141083049E-01+I*(-5.50342260215020E-02):d := -4.63015079213208E-01+I*(2.76640395882342E-01):e := 2.38596377618906E-01+I*(5.23232771709065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20592345914642E-01+I*(-1.61753405012159E-01):b := 2.10090538390027E-01+I*(9.31363102931158E-02):c := -7.31839000473284E-01+I*(5.96751997803797E-02):d := -4.69948950712904E-01+I*(1.99374076912669E-01):e := 4.17305170593611E-01+I*(5.12573441310101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.07459399313021E-01+I*(-3.87238808693968E-01):b := 5.24934778244678E-01+I*(-6.73829389486320E-02):c := -1.01801213534542E+00+I*(-3.07100515467769E-02):d := -4.25594771964752E-01+I*(1.35727635938529E-01):e := 6.89870011020612E-01+I*(5.61930648596805E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.95547090822700E-01+I*(-4.39854822605746E-01):b := 8.69299243162132E-01+I*(1.20301585158435E-02):c := -1.17913495543265E+00+I*(-2.83897716386820E-01):d := -3.50706356146801E-01+I*(1.15481950043122E-01):e := 1.19456968931312E+00+I*(9.58469540929336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.95358770184080E-01+I*(-8.34739033332844E-02):b := 1.18028767258538E+00+I*(3.57738599955865E-01):c := -9.37821912674835E-01+I*(-5.38252223860566E-01):d := -2.68299897753235E-01+I*(-1.58480177862732E-01):e := -4.05599022229430E-02+I*(9.07753210987337E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.97201331255927E-01+I*(1.91100413880959E-01):b := 1.16187930029782E+00+I*(7.10661334526067E-01):c := -7.16459421462010E-01+I*(-7.40892802876886E-01):d := -2.35357552383239E-01+I*(-8.82451118157667E-02):e := -1.91163004077590E-01+I*(6.56733084257561E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.98724290194562E-01+I*(4.66899680201845E-01):b := 9.20923308041643E-01+I*(9.69183160572980E-01):c := -4.16631061742054E-01+I*(-7.53835425781800E-01):d := -2.55268481989752E-01+I*(-1.32669983205464E-02):e := -1.31009712394468E-01+I*(5.01094791924054E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.46006148963002E-01+I*(6.14874353750414E-01):b := 5.70165682521089E-01+I*(1.01233884253920E+00):c := -1.78629855248981E-01+I*(-5.71024095476868E-01):d := -3.18716141324554E-01+I*(3.13710700296038E-02):e := -4.79380796959600E-02+I*(4.34305050441693E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.57296534492777E-01+I*(5.65785440217979E-01):b := 2.73729814954004E-01+I*(8.19935357210741E-01):c := -1.13819211589673E-01+I*(-2.77998265133391E-01):d := -3.96012665442701E-01+I*(2.47824449567787E-02):e := 3.22424941508931E-02+I*(4.08304967169895E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.76858840444615E-02+I*(3.42602187808871E-01):b := 1.70321342292722E-01+I*(4.82000433699352E-01):c := -2.52524751222393E-01+I*(-1.18679773884347E-02):d := -4.50990151654139E-01+I*(-2.99499826430357E-02):e := 1.14059695966481E-01+I*(4.08496719534012E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.58951282504722E-02+I*(4.97545207308719E-02):b := 3.08326238152614E-01+I*(1.56657578444335E-01):c := -5.29844610612628E-01+I*(1.02841448413447E-01):d := -4.57924023153834E-01+I*(-1.07216301612710E-01):e := 2.05629948490525E-01+I*(4.41213774872359E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.52762181648851E-01+I*(-1.75730882950937E-01):b := 6.23170478007265E-01+I*(-3.86167079741248E-03):c := -8.16017745484762E-01+I*(1.24561970862903E-02):d := -4.13569844405683E-01+I*(-1.70862742586850E-01):e := 3.04988033472493E-01+I*(5.44058452256710E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.40849873158530E-01+I*(-2.28346896862715E-01):b := 9.67534942924720E-01+I*(7.55514266670629E-02):c := -9.77140565571997E-01+I*(-2.40731467753753E-01):d := -3.38681428587732E-01+I*(-1.91108428482256E-01):e := 3.05217881933912E-01+I*(7.93931902980154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.40899152208355E-01+I*(-2.08868869097239E-02):b := 1.21470990038524E+00+I*(4.69543405079255E-01):c := -8.10831962558854E-01+I*(-3.75345467936291E-01):d := -6.20157722524836E-02+I*(-3.85612559203494E-01):e := 1.11107969769994E-01+I*(5.72536947798186E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.42741713280202E-01+I*(2.53687430304519E-01):b := 1.19630152809767E+00+I*(8.22466139649457E-01):c := -5.89469471346029E-01+I*(-5.77986046952610E-01):d := -2.90734268824876E-02+I*(-3.15377493156529E-01):e := -8.30886882718055E-03+I*(5.02995664431446E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.44264672218838E-01+I*(5.29486696625405E-01):b := 9.55345535841498E-01+I*(1.08098796569637E+00):c := -2.89641111626074E-01+I*(-5.90928669857524E-01):d := -4.89843564890007E-02+I*(-2.40399379661309E-01):e := -1.86919066090423E-02+I*(4.07014631272983E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.91546530987277E-01+I*(6.77461370173974E-01):b := 6.04587910320943E-01+I*(1.12414364766259E+00):c := -5.16399051330009E-02+I*(-4.08117339552593E-01):d := -1.12432015823802E-01+I*(-1.95761311311159E-01):e := 1.52290428635069E-02+I*(3.49156194515566E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.83691651705168E-03+I*(6.28372456641540E-01):b := 3.08152042753858E-01+I*(9.31740162334131E-01):c := 1.31707385263071E-02+I*(-1.15091509209116E-01):d := -1.89728539941950E-01+I*(-2.02349936383984E-01):e := 6.02339418636017E-02+I*(3.20034080651425E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86773733931263E-01+I*(4.05189204232432E-01):b := 2.04743570092576E-01+I*(5.93805238822742E-01):c := -1.25534801106413E-01+I*(1.51038778535840E-01):d := -2.44706026153387E-01+I*(-2.57082363983798E-01):e := 1.10134223273516E-01+I*(3.11333932090382E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.88564489725253E-01+I*(1.12341537154432E-01):b := 3.42748465952469E-01+I*(2.68462383567725E-01):c := -4.02854660496648E-01+I*(2.65748204337722E-01):d := -2.51639897653082E-01+I*(-3.34348682953472E-01):e := 1.65182127232723E-01+I*(3.24873070613795E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.69743632687439E-03+I*(-1.13143866527377E-01):b := 6.57592705807119E-01+I*(1.07943134325977E-01):c := -6.89027795368782E-01+I*(1.75362953010566E-01):d := -2.07285718904931E-01+I*(-3.97995123927612E-01):e := 2.19872365192320E-01+I*(3.75817506304621E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.86390255182805E-01+I*(-1.65759880439155E-01):b := 1.00195717072457E+00+I*(1.87356231790453E-01):c := -8.50150615456017E-01+I*(-7.78247118294775E-02):d := -1.32397303086980E-01+I*(-4.18240809823018E-01):e := 2.30363159743851E-01+I*(4.85527226610959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.05741617175560E-01+I*(-1.36505940367426E-01):b := 1.16921211327436E+00+I*(5.77317036285582E-01):c := -8.18266461182906E-01+I*(-1.68924086324696E-01):d := 2.42004916275466E-01+I*(-4.27009177835059E-01):e := 2.17648319514121E-01+I*(4.15364684745016E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.07584178247407E-01+I*(1.38068376846817E-01):b := 1.15080374098679E+00+I*(9.30239770855784E-01):c := -5.96903969970080E-01+I*(-3.71564665341016E-01):d := 2.74947261645462E-01+I*(-3.56774111788093E-01):e := 1.21034997368944E-01+I*(4.21168395810642E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09107137186043E-01+I*(4.13867643167703E-01):b := 9.09847748730618E-01+I*(1.18876159690270E+00):c := -2.97075610250125E-01+I*(-3.84507288245930E-01):d := 2.55036332038949E-01+I*(-2.81795998292873E-01):e := 7.47491543894550E-02+I*(3.60820393440381E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.63889959544822E-02+I*(5.61842316716272E-01):b := 5.59090123210064E-01+I*(1.23191727886891E+00):c := -5.90744037570518E-02+I*(-2.01695957940998E-01):d := 1.91588672704148E-01+I*(-2.37157929942723E-01):e := 7.86978121940120E-02+I*(3.06108451754337E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.32320618515743E-01+I*(5.12753403183837E-01):b := 2.62654255642979E-01+I*(1.03951379354046E+00):c := 5.73623990225623E-03+I*(9.13298724024782E-02):d := 1.14292148586000E-01+I*(-2.43746555015548E-01):e := 1.03399864508173E-01+I*(2.70737370902797E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.21931268964058E-01+I*(2.89570150774730E-01):b := 1.59245782981697E-01+I*(7.01578870029070E-01):c := -1.32969299730463E-01+I*(3.57460160147435E-01):d := 5.93146623745625E-02+I*(-2.98478982615363E-01):e := 1.37523999416964E-01+I*(2.51575226388209E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23722024758048E-01+I*(-3.27751630326975E-03):b := 2.97250678841589E-01+I*(3.76236014774052E-01):c := -4.10289159120699E-01+I*(4.72169585949317E-01):d := 5.23807908748671E-02+I*(-3.75745301585037E-01):e := 1.78765481864679E-01+I*(2.48594930371767E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.36854971359670E-01+I*(-2.28762919985079E-01):b := 6.12094918696240E-01+I*(2.15716765532305E-01):c := -6.96462293992832E-01+I*(3.81784334622160E-01):d := 9.67349696230189E-02+I*(-4.39391742559177E-01):e := 2.24761666051774E-01+I*(2.69781457132951E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.12327201500100E-02+I*(-2.81378933896857E-01):b := 9.56459383613694E-01+I*(2.95129862996780E-01):c := -8.57585114080067E-01+I*(1.28596669782118E-01):d := 1.71623385440969E-01+I*(-4.59637428454583E-01):e := 2.56545161500773E-01+I*(3.31374063116810E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.99918989212428E-01+I*(-3.76231623630884E-01):b := 1.06508323149350E+00+I*(6.30631013762914E-01):c := -9.56646724015545E-01+I*(-1.55749375999638E-02):d := 5.01507508854795E-01+I*(-2.63300095827548E-01):e := 3.08598084069587E-01+I*(3.06753189854290E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.01761550284275E-01+I*(-1.01657306416640E-01):b := 1.04667485920594E+00+I*(9.83553748333116E-01):c := -7.35284232802720E-01+I*(-2.18215516616283E-01):d := 5.34449854224792E-01+I*(-1.93065029780583E-01):e := 2.38904222019249E-01+I*(3.61897359962859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.03284509222910E-01+I*(1.74141959904246E-01):b := 8.05718866949765E-01+I*(1.24207557438003E+00):c := -4.35455873082765E-01+I*(-2.31158139521197E-01):d := 5.14538924618278E-01+I*(-1.18086916285363E-01):e := 1.67144828369004E-01+I*(3.35317482095615E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.94336320086505E-02+I*(3.22116633452815E-01):b := 4.54961241429211E-01+I*(1.28523125634624E+00):c := -1.97454666589691E-01+I*(-4.83468092162657E-02):d := 4.51091265283477E-01+I*(-7.34488479352128E-02):e := 1.44907099273046E-01+I*(2.83688247262466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.38143246478876E-01+I*(2.73027719920380E-01):b := 1.58525373862125E-01+I*(1.09282777101779E+00):c := -1.32644022930383E-01+I*(2.44679021127211E-01):d := 3.73794741165329E-01+I*(-8.00374730080379E-02):e := 1.52979318740533E-01+I*(2.41555004765930E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.27753896927191E-01+I*(4.98444675112723E-02):b := 5.51169012008438E-02+I*(7.54892847506402E-01):c := -2.71349562563103E-01+I*(5.10809308872168E-01):d := 3.18817254953893E-01+I*(-1.34769900607852E-01):e := 1.75980093201589E-01+I*(2.12388282422831E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.29544652721180E-01+I*(-2.43003199566727E-01):b := 1.93121797060736E-01+I*(4.29549992251384E-01):c := -5.48669421953339E-01+I*(6.25518734674050E-01):d := 3.11883383454197E-01+I*(-2.12036219577526E-01):e := 2.09372447622722E-01+I*(1.95884341864116E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.42677599322802E-01+I*(-4.68488603248537E-01):b := 5.07966036915387E-01+I*(2.69030743009637E-01):c := -8.34842556825472E-01+I*(5.35133483346893E-01):d := 3.56237562202349E-01+I*(-2.75682660551666E-01):e := 2.52609547055782E-01+I*(1.96843613758214E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.45899078131220E-02+I*(-5.21104617160315E-01):b := 8.52330501832842E-01+I*(3.48443840474112E-01):c := -9.95965376912707E-01+I*(2.81945818506850E-01):d := 4.31125978020299E-01+I*(-2.95928346447072E-01):e := 2.98753832286433E-01+I*(2.30100318233118E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.72946852030414E-01+I*(-6.27893625246925E-01):b := 9.51046316091552E-01+I*(6.04539134930747E-01):c := -1.16122308815207E+00+I*(1.29482072636559E-02):d := 5.95067858367574E-01+I*(2.89133879239419E-02):e := 4.05838086835469E-01+I*(2.08972992420341E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.74789413102260E-01+I*(-3.53319308032682E-01):b := 9.32637943803986E-01+I*(9.57461869500949E-01):c := -9.39860596939243E-01+I*(-1.89692371752664E-01):d := 6.28010203737570E-01+I*(9.91484539709067E-02):e := 3.75361193513536E-01+I*(3.08956292250576E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.76312372040896E-01+I*(-7.75200417117954E-02):b := 6.91681951547814E-01+I*(1.21598369554786E+00):c := -6.40032237219288E-01+I*(-2.02634994657578E-01):d := 6.08099274131057E-01+I*(1.74126567466127E-01):e := 2.78656626636234E-01+I*(3.27242492946963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35942308093350E-02+I*(7.04546318367731E-02):b := 3.40924326027259E-01+I*(1.25913937751408E+00):c := -4.02031030726214E-01+I*(-1.98236643526459E-02):d := 5.44651614796256E-01+I*(2.18764635816277E-01):e := 2.24028375593377E-01+I*(2.79543935448584E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65115383660890E-01+I*(2.13657183043383E-02):b := 4.44884584601739E-02+I*(1.06673589218562E+00):c := -3.37220387066907E-01+I*(2.73202165990831E-01):d := 4.67355090678108E-01+I*(2.12176010743452E-01):e := 2.13451427536830E-01+I*(2.27927370420578E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54726034109205E-01+I*(-2.01817534104770E-01):b := -5.89200142011078E-02+I*(7.28800968674235E-01):c := -4.75925926699627E-01+I*(5.39332453735787E-01):d := 4.12377604466671E-01+I*(1.57443583143638E-01):e := 2.25836025459111E-01+I*(1.86653147133019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56516789903194E-01+I*(-4.94665201182769E-01):b := 7.90848816587846E-02+I*(4.03458113419218E-01):c := -7.53245786089862E-01+I*(6.54041879537669E-01):d := 4.05443732966976E-01+I*(8.01772641739643E-02):e := 2.52994199916830E-01+I*(1.55923855939963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69649736504816E-01+I*(-7.20150604864578E-01):b := 3.93929121513435E-01+I*(2.42938864177470E-01):c := -1.03941892096200E+00+I*(5.63656628210513E-01):d := 4.49797911715127E-01+I*(1.65308231998242E-02):e := 2.94952828789591E-01+I*(1.38101253844358E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.84379550048641E-02+I*(-7.72766618776356E-01):b := 7.38293586430890E-01+I*(3.22351961641945E-01):c := -1.20054174104923E+00+I*(3.10468963370469E-01):d := 5.24686327533077E-01+I*(-3.71486269558183E-03):e := 3.53011582455602E-01+I*(1.46074184142677E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.90654657002692E-01+I*(-7.73736497747804E-01):b := 8.80460507164217E-01+I*(5.11250079873586E-01):c := -1.33627199919997E+00+I*(-9.67009482149697E-02):d := 4.78908037469311E-01+I*(3.12901336780964E-01):e := 5.39565101214655E-01+I*(9.79658578716592E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.92497218074538E-01+I*(-4.99162180533561E-01):b := 8.62052134876651E-01+I*(8.64172814443788E-01):c := -1.11490950798714E+00+I*(-2.99341527231289E-01):d := 5.11850382839308E-01+I*(3.83136402827930E-01):e := 5.84305868313971E-01+I*(2.56610957586125E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.94020177013174E-01+I*(-2.23362914212674E-01):b := 6.21096142620479E-01+I*(1.12269464049070E+00):c := -8.15081148267186E-01+I*(-3.12284150136203E-01):d := 4.91939453232794E-01+I*(4.58114516323150E-01):e := 4.46684557263688E-01+I*(3.60750568069154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.41302035781614E-01+I*(-7.53882406641055E-02):b := 2.70338517099924E-01+I*(1.16585032245692E+00):c := -5.77079941774112E-01+I*(-1.29472819831271E-01):d := 4.28491793897993E-01+I*(5.02752584673300E-01):e := 3.32500880134689E-01+I*(3.13480897102480E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.74075786886115E-02+I*(-1.24477154196540E-01):b := -2.60973504671609E-02+I*(9.73446837128462E-01):c := -5.12269298114805E-01+I*(1.63553010512205E-01):d := 3.51195269779845E-01+I*(4.96163959600475E-01):e := 2.95004206645988E-01+I*(2.40624976265658E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.37018229136927E-01+I*(-3.47660406605648E-01):b := -1.29505823128443E-01+I*(6.35511913617074E-01):c := -6.50974837747524E-01+I*(4.29683298257162E-01):d := 2.96217783568408E-01+I*(4.41431532000660E-01):e := 2.95653682890149E-01+I*(1.78685804056171E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.38808984930916E-01+I*(-6.40508073683647E-01):b := 8.49907273144965E-03+I*(3.10169058362057E-01):c := -9.28294697137759E-01+I*(5.44392724059043E-01):d := 2.89283912068713E-01+I*(3.64165213030987E-01):e := 3.17657291216560E-01+I*(1.27521421708351E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.19419315325378E-02+I*(-8.65993477365456E-01):b := 3.23343312586100E-01+I*(1.49649809120309E-01):c := -1.21446783200989E+00+I*(4.54007472731887E-01):d := 3.33638090816864E-01+I*(3.00518772056847E-01):e := 3.60238336961633E-01+I*(8.56792072397210E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.36145759977142E-01+I*(-9.18609491277235E-01):b := 6.67707777503555E-01+I*(2.29062906584785E-01):c := -1.37559065209713E+00+I*(2.00819807891844E-01):d := 4.08526506634814E-01+I*(2.80273086161441E-01):e := 4.32628448380838E-01+I*(6.18246657527448E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.51174502629995E-01+I*(-7.45518740227377E-01):b := 8.86353689182483E-01+I*(3.94414834245035E-01):c := -1.39988612622798E+00+I*(-2.93216345572769E-01):d := 2.07380517330912E-01+I*(4.55782633298832E-01):e := 8.00910474242343E-01+I*(-6.08407023114342E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.53017063701841E-01+I*(-4.70944423013134E-01):b := 8.67945316894917E-01+I*(7.47337568815237E-01):c := -1.17852363501516E+00+I*(-4.95856924589089E-01):d := 2.40322862700908E-01+I*(5.26017699345797E-01):e := 1.07302216302722E+00+I*(2.55526812233567E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.54540022640476E-01+I*(-1.95145156692248E-01):b := 6.26989324638744E-01+I*(1.00585939486215E+00):c := -8.78695275295202E-01+I*(-5.08799547494002E-01):d := 2.20411933094395E-01+I*(6.00995812841017E-01):e := 7.30542463457431E-01+I*(6.14015697556824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.01821881408916E-01+I*(-4.71704831436789E-02):b := 2.76231699118190E-01+I*(1.04901507682837E+00):c := -6.40694068802129E-01+I*(-3.25988217189071E-01):d := 1.56964273759594E-01+I*(6.45633881191168E-01):e := 4.62142084579432E-01+I*(4.80653708814329E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13112266938691E-01+I*(-9.62593966761135E-02):b := -2.02041684488951E-02+I*(8.56611591499911E-01):c := -5.75883425142821E-01+I*(-3.29623868455948E-02):d := 7.96677496414459E-02+I*(6.39045256118342E-01):e := 3.96802463369868E-01+I*(3.31906212201960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35016164903757E-02+I*(-3.19442649085221E-01):b := -1.23612641110177E-01+I*(5.18676667988523E-01):c := -7.14588964775541E-01+I*(2.33167900899362E-01):d := 2.46902634300089E-02+I*(5.84312828518528E-01):e := 3.95639454806747E-01+I*(2.21440553999413E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.17108606963860E-02+I*(-6.12290316163220E-01):b := 1.43922547497153E-02+I*(1.93333812733506E-01):c := -9.91908824165776E-01+I*(3.47877326701244E-01):d := 1.77563919303135E-02+I*(5.07046509548854E-01):e := 4.22783629689107E-01+I*(1.30908464727073E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.08577914094765E-01+I*(-8.37775719845030E-01):b := 3.29236494604366E-01+I*(3.28145634917577E-02):c := -1.27808195903791E+00+I*(2.57492075374087E-01):d := 6.21105706784651E-02+I*(4.43400068574714E-01):e := 4.77382394933025E-01+I*(4.71313442020233E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.96665605604444E-01+I*(-8.90391733756808E-01):b := 6.73600959521820E-01+I*(1.12227660956234E-01):c := -1.43920477912515E+00+I*(4.30441053404387E-03):d := 1.36998986496415E-01+I*(4.23154382679308E-01):e := 5.82128780649532E-01+I*(-3.27569743588495E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.29928544178383E-01+I*(-6.13285377449415E-01):b := 8.07592771172984E-01+I*(5.16203057484758E-01):c := -1.47380790429756E+00+I*(-9.24031119807851E-01):d := -5.13572548534663E-02+I*(6.17634730256292E-01):e := 5.83662237878009E-01+I*(-4.50865223691929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03177110525023E+00+I*(-3.38711060235172E-01):b := 7.89184398885418E-01+I*(8.69125792054960E-01):c := -1.25244541308474E+00+I*(-1.12667169882417E+00):d := -1.84149094834700E-02+I*(6.87869796303257E-01):e := 9.09773744556831E-01+I*(-6.68820770025582E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.33294064188864E-01+I*(-6.29117939142853E-02):b := 5.48228406629245E-01+I*(1.12764761810187E+00):c := -9.52617053364780E-01+I*(-1.13961432172909E+00):d := -3.83258390899834E-02+I*(7.62847909798477E-01):e := 1.56365048066757E+00+I*(-1.48930248424165E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.80575922957304E-01+I*(8.50628796342831E-02):b := 1.97470781108691E-01+I*(1.17080330006809E+00):c := -7.14615846871707E-01+I*(-9.56802991424153E-01):d := -1.01773498424784E-01+I*(8.07485978148627E-01):e := 9.91184387908656E-01+I*(3.94287383379287E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.91866308487079E-01+I*(3.59739661018485E-02):b := -9.89650864583942E-02+I*(9.78399814739635E-01):c := -6.49805203212399E-01+I*(-6.63777161080677E-01):d := -1.79070022542932E-01+I*(8.00897353075802E-01):e := 6.62738782655011E-01+I*(2.54970128685187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.02255658038763E-01+I*(-1.87209286307259E-01):b := -2.02373559119676E-01+I*(6.40464891228247E-01):c := -7.88510742845119E-01+I*(-3.97646873335720E-01):d := -2.34047508754369E-01+I*(7.46164925475988E-01):e := 5.48520038819608E-01+I*(1.07014985388574E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.00464902244774E-01+I*(-4.80056953385259E-01):b := -6.43686632597836E-02+I*(3.15122035973229E-01):c := -1.06583060223535E+00+I*(-2.82937447533838E-01):d := -2.40981380254065E-01+I*(6.68898606506314E-01):e := 5.01966501640144E-01+I*(-1.67200323481447E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.87331955643153E-01+I*(-7.05542357067068E-01):b := 2.50475576594867E-01+I*(1.54602786731481E-01):c := -1.35200373710749E+00+I*(-3.73322698860995E-01):d := -1.96627201505913E-01+I*(6.05252165532174E-01):e := 4.87001745278403E-01+I*(-1.35350273462035E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.75419647152832E-01+I*(-7.58158370978846E-01):b := 5.94840041512321E-01+I*(2.34015884195957E-01):c := -1.51312655719472E+00+I*(-6.26510363701038E-01):d := -1.21738785687963E-01+I*(5.85006479636768E-01):e := 5.02208130506635E-01+I*(-2.70272211441220E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.47378274238898E-01+I*(-3.51823451490835E-01):b := 9.23676367211198E-01+I*(5.01718481335593E-01):c := -1.29132449462561E+00+I*(-1.02080334594082E+00):d := -2.39218122483151E-01+I*(3.75043400030834E-01):e := 1.26558278136858E+00+I*(-8.03010971475371E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04922083531074E+00+I*(-7.72491342765916E-02):b := 9.05267994923631E-01+I*(8.54641215905795E-01):c := -1.06996200341279E+00+I*(-1.22344392495714E+00):d := -2.06275777113155E-01+I*(4.45278466077799E-01):e := 4.59326107350119E+00+I*(-1.19683700426160E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.50743794249380E-01+I*(1.98550132044294E-01):b := 6.64312002667460E-01+I*(1.11316304195271E+00):c := -7.70133643692833E-01+I*(-1.23638654786205E+00):d := -2.26186706719669E-01+I*(5.20256579573019E-01):e := 6.73076976015459E-01+I*(2.22943450594469E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.98025653017820E-01+I*(3.46524805592863E-01):b := 3.13554377146904E-01+I*(1.15631872391892E+00):c := -5.32132437199759E-01+I*(-1.05357521755712E+00):d := -2.89634366054470E-01+I*(5.64894647923169E-01):e := 4.51940054426463E-01+I*(1.02290371925908E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.09316038547595E-01+I*(2.97435892060428E-01):b := 1.71185095798201E-02+I*(9.63915238590469E-01):c := -4.67321793540452E-01+I*(-7.60549387213645E-01):d := -3.66930890172618E-01+I*(5.58306022850345E-01):e := 5.02223129611070E-01+I*(6.09837161703845E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.19705388099280E-01+I*(7.42526396513210E-02):b := -8.62899630814622E-02+I*(6.25980315079081E-01):c := -6.06027333173171E-01+I*(-4.94419099468689E-01):d := -4.21908376384055E-01+I*(5.03573595250530E-01):e := 5.62364598593313E-01+I*(3.67256309656346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.17914632305290E-01+I*(-2.18595027426679E-01):b := 5.17149327784306E-02+I*(3.00637459824063E-01):c := -8.83347192563406E-01+I*(-3.79709673666807E-01):d := -4.28842247883751E-01+I*(4.26307276280856E-01):e := 6.28466167761304E-01+I*(1.72012671880763E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.04781685703669E-01+I*(-4.44080431108487E-01):b := 3.66559172633081E-01+I*(1.40118210582316E-01):c := -1.16952032743554E+00+I*(-4.70094924993963E-01):d := -3.84488069135599E-01+I*(3.62660835306716E-01):e := 7.14843668973693E-01+I*(-2.98566654361382E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.92869377213348E-01+I*(-4.96696445020266E-01):b := 7.10923637550536E-01+I*(2.19531308046791E-01):c := -1.33064314752278E+00+I*(-7.23282589834006E-01):d := -3.09599653317648E-01+I*(3.42415149411310E-01):e := 8.62592481823991E-01+I*(-2.99805857237324E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.92681056574728E-01+I*(-1.40315525747804E-01):b := 1.02191206697379E+00+I*(5.65239749486812E-01):c := -1.08933010476496E+00+I*(-9.77637097307753E-01):d := -2.27193194924083E-01+I*(6.84530215054557E-02):e := 1.41526961041351E+00+I*(9.85166422824396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.94523617646575E-01+I*(1.34258791466439E-01):b := 1.00350369468622E+00+I*(9.18162484057014E-01):c := -8.67967613552131E-01+I*(-1.18027767632407E+00):d := -1.94250849554086E-01+I*(1.38688087552421E-01):e := 2.78909661294074E-01+I*(1.52212165852591E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.96046576585211E-01+I*(4.10058057787325E-01):b := 7.62547702430047E-01+I*(1.17668431010393E+00):c := -5.68139253832177E-01+I*(-1.19322029922899E+00):d := -2.14161779160600E-01+I*(2.13666201047642E-01):e := 3.03136467116461E-02+I*(9.08217537638443E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.43328435353650E-01+I*(5.58032731335894E-01):b := 4.11790076909492E-01+I*(1.21983999207014E+00):c := -3.30138047339103E-01+I*(-1.01040896892405E+00):d := -2.77609438495401E-01+I*(2.58304269397791E-01):e := 1.16828422626828E-01+I*(6.42457911710028E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.54618820883425E-01+I*(5.08943817803459E-01):b := 1.15354209342407E-01+I*(1.02743650674169E+00):c := -2.65327403679795E-01+I*(-7.17383138580579E-01):d := -3.54905962613549E-01+I*(2.51715644324966E-01):e := 2.18046992386378E-01+I*(5.06405429152144E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.50081704351096E-02+I*(2.85760565394352E-01):b := 1.19457366811250E-02+I*(6.89501583230300E-01):c := -4.04032943312514E-01+I*(-4.51252850835621E-01):d := -4.09883448824986E-01+I*(1.96983216725152E-01):e := 3.21795928690756E-01+I*(4.17200823724639E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.32174146411204E-02+I*(-7.08710168364782E-03):b := 1.49950632541018E-01+I*(3.64158727975283E-01):c := -6.81352802702750E-01+I*(-3.36543425033740E-01):d := -4.16817320324681E-01+I*(1.19716897755478E-01):e := 4.44049872521483E-01+I*(3.48737770444135E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.50084468039499E-01+I*(-2.32572505365457E-01):b := 4.64794872395668E-01+I*(2.03639478733535E-01):c := -9.67525937574884E-01+I*(-4.26928676360896E-01):d := -3.72463141576530E-01+I*(5.60704567813380E-02):e := 6.20085708800954E-01+I*(2.98623883167599E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.38172159549178E-01+I*(-2.85188519277235E-01):b := 8.09159337313123E-01+I*(2.83052576198010E-01):c := -1.12864875766212E+00+I*(-6.80116341200939E-01):d := -2.97574725758579E-01+I*(3.58247708859319E-02):e := 9.42123451852117E-01+I*(3.27577079597587E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.38221438599003E-01+I*(-7.77285093242441E-02):b := 1.05633429477364E+00+I*(6.77044554610202E-01):c := -9.62340154648977E-01+I*(-8.14730341383477E-01):d := -2.09090694233302E-02+I*(-1.58679359835306E-01):e := 5.44980276283751E-01+I*(5.85532621896198E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.40063999670849E-01+I*(1.96845807889999E-01):b := 1.03792592248607E+00+I*(1.02996728918040E+00):c := -7.40977663436152E-01+I*(-1.01737092039980E+00):d := 1.20332759466659E-02+I*(-8.84442937883411E-02):e := 2.84647655854226E-01+I*(7.05151026261193E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.41586958609485E-01+I*(4.72645074210885E-01):b := 7.96969930229901E-01+I*(1.28848911522732E+00):c := -4.41149303716197E-01+I*(-1.03031354330471E+00):d := -7.87765365984739E-03+I*(-1.34661802931207E-02):e := 1.37277347798109E-01+I*(5.60322882057994E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.88868817377925E-01+I*(6.20619747759454E-01):b := 4.46212304709346E-01+I*(1.33164479719353E+00):c := -2.03148097223123E-01+I*(-8.47502212999779E-01):d := -7.13253129946488E-02+I*(3.11718880570293E-02):e := 1.35582903073997E-01+I*(4.36214275384673E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59202907699777E-04+I*(5.71530834227020E-01):b := 1.49776437142261E-01+I*(1.13924131186508E+00):c := -1.38337453563815E-01+I*(-5.54476382656304E-01):d := -1.48621837112797E-01+I*(2.45832629842041E-02):e := 1.74729353376662E-01+I*(3.59616035018845E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.89451447540616E-01+I*(3.48347581817912E-01):b := 4.63679644809794E-02+I*(8.01306388353690E-01):c := -2.77042993196535E-01+I*(-2.88346094911346E-01):d := -2.03599323324234E-01+I*(-3.01491646156102E-02):e := 2.28751897285279E-01+I*(3.10969608864099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.91242203334605E-01+I*(5.54999147399123E-02):b := 1.84372860340872E-01+I*(4.75963533098673E-01):c := -5.54362852586770E-01+I*(-1.73636669109464E-01):d := -2.10533194823929E-01+I*(-1.07415483585284E-01):e := 2.97610624124034E-01+I*(2.82306248408855E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.37514993622658E-03+I*(-1.69985488941897E-01):b := 4.99217100195523E-01+I*(3.15444283856925E-01):c := -8.40535987458903E-01+I*(-2.64021920436621E-01):d := -1.66179016075777E-01+I*(-1.71061924559424E-01):e := 3.90638816277808E-01+I*(2.81523049095033E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.83712541573453E-01+I*(-2.22601502853675E-01):b := 8.43581565112977E-01+I*(3.94857381321401E-01):c := -1.00165880754614E+00+I*(-5.17209585276664E-01):d := -9.12906002578271E-02+I*(-1.91307610454830E-01):e := 5.12036630084770E-01+I*(3.53448919076435E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03063903566208E-01+I*(-1.93347562781946E-01):b := 1.01083650766276E+00+I*(7.84818185816529E-01):c := -9.69774653273028E-01+I*(-6.08308959771883E-01):d := 2.83111619104619E-01+I*(-2.00075978466871E-01):e := 4.26609266391375E-01+I*(3.15632055937619E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.04906464638055E-01+I*(8.12267544322971E-02):b := 9.92428135375194E-01+I*(1.13774092038673E+00):c := -7.48412162060202E-01+I*(-8.10949538788203E-01):d := 3.16053964474615E-01+I*(-1.29840912419906E-01):e := 3.43267783298213E-01+I*(4.23409229438620E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.06429423576691E-01+I*(3.57026020753183E-01):b := 7.51472143119022E-01+I*(1.39626274643364E+00):c := -4.48583802340248E-01+I*(-8.23892161693117E-01):d := 2.96143034868102E-01+I*(-5.48627989246855E-02):e := 2.27574548561893E-01+I*(3.99736140119015E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.37112823451299E-02+I*(5.05000694301752E-01):b := 4.00714517598467E-01+I*(1.43941842839986E+00):c := -2.10582595847174E-01+I*(-6.41080831388185E-01):d := 2.32695375533300E-01+I*(-1.02247305745356E-02):e := 1.87660703931932E-01+I*(3.28210108503921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.34998332125095E-01+I*(4.55911780769318E-01):b := 1.04278650031382E-01+I*(1.24701494307141E+00):c := -1.45771952187866E-01+I*(-3.48055001044709E-01):d := 1.55398851415152E-01+I*(-1.68133556473609E-02):e := 1.92715931608867E-01+I*(2.69438179173041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.24608982573410E-01+I*(2.32728528360210E-01):b := 8.70177370100259E-04+I*(9.09080019560017E-01):c := -2.84477491820585E-01+I*(-8.19247132997518E-02):d := 1.00421365203715E-01+I*(-7.15457832471752E-02):e := 2.17929370333728E-01+I*(2.27273026553468E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26399738367400E-01+I*(-6.01191387177897E-02):b := 1.38875073229993E-01+I*(5.83737164305000E-01):c := -5.61797351210821E-01+I*(3.27847125021301E-02):d := 9.34874937040202E-02+I*(-1.48812102216849E-01):e := 2.57041031767184E-01+I*(1.99074860150563E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.39532684969021E-01+I*(-2.85604542399599E-01):b := 4.53719313084643E-01+I*(4.23217915063252E-01):c := -8.47970486082954E-01+I*(-5.76005388250261E-02):d := 1.37841672452172E-01+I*(-2.12458543190989E-01):e := 3.11854274700619E-01+I*(1.88589110834179E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.85550065406578E-02+I*(-3.38220556311377E-01):b := 7.98083778002098E-01+I*(5.02631012527728E-01):c := -1.00909330617019E+00+I*(-3.10788203665069E-01):d := 2.12730088270122E-01+I*(-2.32704229086395E-01):e := 3.82252670041984E-01+I*(2.15341587263100E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.97241275603077E-01+I*(-4.33073246045404E-01):b := 9.06707625881907E-01+I*(8.38132163293861E-01):c := -1.10815491610567E+00+I*(-4.54959811047151E-01):d := 5.42614211683948E-01+I*(-3.63668964593604E-02):e := 4.01294611437425E-01+I*(1.58669949221883E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.99083836674922E-01+I*(-1.58498928831160E-01):b := 8.88299253594341E-01+I*(1.19105489786406E+00):c := -8.86792424892842E-01+I*(-6.57600390063470E-01):d := 5.75556557053944E-01+I*(3.38681695876047E-02):e := 3.93650683873411E-01+I*(2.53528978159231E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.00606795613559E-01+I*(1.17300337489726E-01):b := 6.47343261338169E-01+I*(1.44957672391098E+00):c := -5.86964065172887E-01+I*(-6.70543012968384E-01):d := 5.55645627447431E-01+I*(1.08846283082825E-01):e := 3.08024544518484E-01+I*(2.90938977023122E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.21113456180025E-02+I*(2.65275011038295E-01):b := 2.96585635817614E-01+I*(1.49273240587719E+00):c := -3.48962858679813E-01+I*(-4.87731682663453E-01):d := 4.92197968112630E-01+I*(1.53484351432975E-01):e := 2.46439966035975E-01+I*(2.55830026985232E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.40820960088227E-01+I*(2.16186097505860E-01):b := 1.49768250529068E-04+I*(1.30032892054874E+00):c := -2.84152215020505E-01+I*(-1.94705852319976E-01):d := 4.14901443994482E-01+I*(1.46895726360150E-01):e := 2.27706505971428E-01+I*(2.07778567414366E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.30431610536543E-01+I*(-6.99715490324751E-03):b := -1.03258704410753E-01+I*(9.62393997037349E-01):c := -4.22857754653225E-01+I*(7.14244354249807E-02):d := 3.59923957783046E-01+I*(9.21632987603355E-02):e := 2.33588384667761E-01+I*(1.66544095425128E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.32222366330532E-01+I*(-2.99844821981247E-01):b := 3.47461914491397E-02+I*(6.37051141782332E-01):c := -7.00177614043461E-01+I*(1.86133861226863E-01):d := 3.52990086283350E-01+I*(1.48969797906618E-02):e := 2.55058277655411E-01+I*(1.34064316187391E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.45355312932153E-01+I*(-5.25330225663056E-01):b := 3.49590431303790E-01+I*(4.76531892540584E-01):c := -9.86350748915594E-01+I*(9.57486098997061E-02):d := 3.97344265031501E-01+I*(-4.87494611834782E-02):e := 2.91404569361078E-01+I*(1.12265863527576E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.72676214224740E-02+I*(-5.77946239574835E-01):b := 6.93954896221245E-01+I*(5.55944990005059E-01):c := -1.14747356900283E+00+I*(-1.57439054940337E-01):d := 4.72232680849452E-01+I*(-6.89951470788840E-02):e := 3.44688472797196E-01+I*(1.11574070727842E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70269138421062E-01+I*(-6.84735247661445E-01):b := 7.92670710479956E-01+I*(8.12040284461695E-01):c := -1.31273128024219E+00+I*(-4.26436666183531E-01):d := 6.36174561196727E-01+I*(2.55846587292129E-01):e := 4.00800575199065E-01+I*(3.80517207449835E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.72111699492908E-01+I*(-4.10160930447202E-01):b := 7.74262338192390E-01+I*(1.16496301903190E+00):c := -1.09136878902937E+00+I*(-6.29077245199850E-01):d := 6.69116906566723E-01+I*(3.26081653339094E-01):e := 4.44295227449992E-01+I*(1.13338927362779E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73634658431544E-01+I*(-1.34361664126315E-01):b := 5.33306345936218E-01+I*(1.42348484507881E+00):c := -7.91540429309410E-01+I*(-6.42019868104765E-01):d := 6.49205976960210E-01+I*(4.01059766834314E-01):e := 3.95495461130097E-01+I*(1.95130457439220E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.09165171999829E-02+I*(1.36130094222532E-02):b := 1.82548720415662E-01+I*(1.46664052704503E+00):c := -5.53539222816336E-01+I*(-4.59208537799833E-01):d := 5.85758317625409E-01+I*(4.45697835184465E-01):e := 3.17817690855802E-01+I*(1.97366088365322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.67793097270242E-01+I*(-3.54759041101815E-02):b := -1.13887147151422E-01+I*(1.27423704171657E+00):c := -4.88728579157029E-01+I*(-1.66182707456356E-01):d := 5.08461793507261E-01+I*(4.39109210111639E-01):e := 2.76133088661660E-01+I*(1.59664535339528E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.57403747718557E-01+I*(-2.58659156519289E-01):b := -2.17295619812704E-01+I*(9.36302118205183E-01):c := -6.27434118789748E-01+I*(9.99475802886005E-02):d := 4.53484307295824E-01+I*(3.84376782511825E-01):e := 2.64370360898379E-01+I*(1.17803320817960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.59194503512546E-01+I*(-5.51506823597289E-01):b := -7.92907239528117E-02+I*(6.10959262950165E-01):c := -9.04753978179984E-01+I*(2.14657006090482E-01):d := 4.46550435796128E-01+I*(3.07110463542151E-01):e := 2.71509583456659E-01+I*(7.98881684385848E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.72327450114168E-01+I*(-7.76992227279098E-01):b := 2.35553515901839E-01+I*(4.50440013708418E-01):c := -1.19092711305212E+00+I*(1.24271754763326E-01):d := 4.90904614544280E-01+I*(2.43464022568011E-01):e := 2.94806310262412E-01+I*(4.76098604559427E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.57602413955115E-02+I*(-8.29608241190876E-01):b := 5.79917980819293E-01+I*(5.29853111172893E-01):c := -1.35204993313935E+00+I*(-1.28915910076717E-01):d := 5.65793030362230E-01+I*(2.23218336672605E-01):e := 3.37597261733626E-01+I*(2.66872772118905E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.87976943393340E-01+I*(-8.30578120162324E-01):b := 7.22084901552621E-01+I*(7.18751229404534E-01):c := -1.48778019129009E+00+I*(-5.36085821662156E-01):d := 5.20014740298465E-01+I*(5.39834536149152E-01):e := 4.16034744805003E-01+I*(-7.93497901128505E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89819504465186E-01+I*(-5.56003802948080E-01):b := 7.03676529265055E-01+I*(1.07167396397474E+00):c := -1.26641770007726E+00+I*(-7.38726400678475E-01):d := 5.52957085668461E-01+I*(6.10069602196117E-01):e := 5.07739153132442E-01+I*(-3.57599588875453E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.91342463403822E-01+I*(-2.80204536627194E-01):b := 4.62720537008882E-01+I*(1.33019579002165E+00):c := -9.66589340357308E-01+I*(-7.51669023583390E-01):d := 5.33046156061947E-01+I*(6.85047715691338E-01):e := 5.16363982016373E-01+I*(8.95846696327466E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.38624322172261E-01+I*(-1.32229863078625E-01):b := 1.11962911488327E-01+I*(1.37335147198786E+00):c := -7.28588133864234E-01+I*(-5.68857693278458E-01):d := 4.69598496727146E-01+I*(7.29685784041488E-01):e := 4.21746316531758E-01+I*(1.46013129937763E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.00852922979634E-02+I*(-1.81318776611060E-01):b := -1.84472956078758E-01+I*(1.18094798665941E+00):c := -6.63777490204926E-01+I*(-2.75831862934982E-01):d := 3.92301972608998E-01+I*(7.23097158968662E-01):e := 3.48253588720050E-01+I*(1.21342344663371E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.39695942746279E-01+I*(-4.04502029020167E-01):b := -2.87881428740039E-01+I*(8.43013063148022E-01):c := -8.02483029837646E-01+I*(-9.70157519002499E-03):d := 3.37324486397561E-01+I*(6.68364731368848E-01):e := 3.14507516842706E-01+I*(7.63799216588183E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.41486698540268E-01+I*(-6.97349696098167E-01):b := -1.49876532880147E-01+I*(5.17670207893004E-01):c := -1.07980288922788E+00+I*(1.05007850611857E-01):d := 3.30390614897865E-01+I*(5.91098412399174E-01):e := 3.06006950837884E-01+I*(3.02819542572927E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.46196451418897E-02+I*(-9.22835099779976E-01):b := 1.64967706974504E-01+I*(3.57150958651257E-01):c := -1.36597602410002E+00+I*(1.46225992847004E-02):d := 3.74744793646017E-01+I*(5.27451971425034E-01):e := 3.16565469534353E-01+I*(-1.43835453165810E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.33468046367789E-01+I*(-9.75451113691755E-01):b := 5.09332171891958E-01+I*(4.36564056115732E-01):c := -1.52709884418725E+00+I*(-2.38565065555342E-01):d := 4.49633209463968E-01+I*(5.07206285529628E-01):e := 3.49521704233924E-01+I*(-5.56685454146991E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.48496789020643E-01+I*(-8.02360362641897E-01):b := 7.27978083570887E-01+I*(6.01915983775982E-01):c := -1.55139431831810E+00+I*(-7.32601219019956E-01):d := 2.48487220160065E-01+I*(6.82715832667019E-01):e := 4.57135650360127E-01+I*(-2.23177850689554E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.50339350092489E-01+I*(-5.27786045427654E-01):b := 7.09569711283321E-01+I*(9.54838718346184E-01):c := -1.33003182710528E+00+I*(-9.35241798036275E-01):d := 2.81429565530061E-01+I*(7.52950898713984E-01):e := 6.14107027167083E-01+I*(-2.43586697784228E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.51862309031125E-01+I*(-2.51986779106767E-01):b := 4.68613719027148E-01+I*(1.21336054439310E+00):c := -1.03020346738532E+00+I*(-9.48184420941190E-01):d := 2.61518635923548E-01+I*(8.27929012209205E-01):e := 7.49686197443617E-01+I*(-5.30369415854869E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.99144167799564E-01+I*(-1.04012105558199E-01):b := 1.17856093506593E-01+I*(1.25651622635931E+00):c := -7.92202260892251E-01+I*(-7.65373090636258E-01):d := 1.98070976588746E-01+I*(8.72567080559355E-01):e := 6.14577803615357E-01+I*(1.22940676354992E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.10434553329339E-01+I*(-1.53101019090633E-01):b := -1.78579774060491E-01+I*(1.06411274103086E+00):c := -7.27391617232943E-01+I*(-4.72347260292782E-01):d := 1.20774452470599E-01+I*(8.65978455486530E-01):e := 4.71956639560217E-01+I*(1.10977889114588E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.08239028810239E-02+I*(-3.76284271499741E-01):b := -2.81988246721774E-01+I*(7.26177817519470E-01):c := -8.66097156865663E-01+I*(-2.06216972547825E-01):d := 6.57969662591615E-02+I*(8.11246027886716E-01):e := 4.01814323733523E-01+I*(5.07011979377123E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.90331470870346E-02+I*(-6.69131938577740E-01):b := -1.43983350861881E-01+I*(4.00834962264453E-01):c := -1.14341701625590E+00+I*(-9.15075467459429E-02):d := 5.88630947594661E-02+I*(7.33979708917042E-01):e := 3.72143037009187E-01+I*(-1.38426891016254E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.05900200485413E-01+I*(-8.94617342259549E-01):b := 1.70860888992770E-01+I*(2.40315713022705E-01):c := -1.42959015112803E+00+I*(-1.81892798073099E-01):d := 1.03217273507618E-01+I*(6.70333267942902E-01):e := 3.67421097351048E-01+I*(-7.96148710305899E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.93987891995093E-01+I*(-9.47233356171328E-01):b := 5.15225353910224E-01+I*(3.19728810487180E-01):c := -1.59071297121527E+00+I*(-4.35080462913143E-01):d := 1.78105689325567E-01+I*(6.50087582047496E-01):e := 3.88880102135806E-01+I*(-1.50247359205152E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.64414387150209E-01+I*(-6.58549787568306E-01):b := 5.52890850654411E-01+I*(5.73356283060006E-01):c := -1.30743876039966E+00+I*(-1.35800704914414E+00):d := -1.65737542356646E-01+I*(8.17898525845150E-01):e := 2.42786181272591E-01+I*(-4.34063801266432E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06625694822205E+00+I*(-3.83975470354062E-01):b := 5.34482478366845E-01+I*(9.26279017630208E-01):c := -1.08607626918684E+00+I*(-1.56064762816046E+00):d := -1.32795196986651E-01+I*(8.88133591892115E-01):e := 2.49731101545454E-01+I*(-5.82326976937237E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.67779907160690E-01+I*(-1.08176204033175E-01):b := 2.93526486110671E-01+I*(1.18480084367712E+00):c := -7.86247909466881E-01+I*(-1.57359025106538E+00):d := -1.52706126593164E-01+I*(9.63111705387335E-01):e := 4.28058753854384E-01+I*(-7.78547905249485E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.15061765929129E-01+I*(3.97984695153923E-02):b := -5.72311394098824E-02+I*(1.22795652564334E+00):c := -5.48246702973809E-01+I*(-1.39077892076044E+00):d := -2.16153785927965E-01+I*(1.00774977373748E+00):e := 8.26292595325532E-01+I*(-6.14160516151402E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.26352151458905E-01+I*(-9.29044401704197E-03):b := -3.53667006976968E-01+I*(1.03555304031488E+00):c := -4.83436059314500E-01+I*(-1.09775309041697E+00):d := -2.93450310046113E-01+I*(1.00116114866466E+00):e := 7.31376392807497E-01+I*(-2.51356603339505E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.36741501010589E-01+I*(-2.32473696426150E-01):b := -4.57075479638250E-01+I*(6.97618116803493E-01):c := -6.22141598947220E-01+I*(-8.31622802672011E-01):d := -3.48427796257550E-01+I*(9.46428721064845E-01):e := 5.35014534730588E-01+I*(-1.87456829227439E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.34950745216600E-01+I*(-5.25321363504149E-01):b := -3.19070583778357E-01+I*(3.72275261548475E-01):c := -8.99461458337456E-01+I*(-7.16913376870129E-01):d := -3.55361667757245E-01+I*(8.69162402095171E-01):e := 4.13732175388912E-01+I*(-2.16232793627866E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.21817798614979E-01+I*(-7.50806767185958E-01):b := -4.22634392370573E-03+I*(2.11756012306728E-01):c := -1.18563459320959E+00+I*(-8.07298628197287E-01):d := -3.11007489009094E-01+I*(8.05515961121032E-01):e := 3.35302026774125E-01+I*(-2.68976300492418E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.09905490124658E-01+I*(-8.03422781097737E-01):b := 3.40138120993748E-01+I*(2.91169109771203E-01):c := -1.34675741329683E+00+I*(-1.06048629303733E+00):d := -2.36119073191143E-01+I*(7.85270275225625E-01):e := 2.79524613507767E-01+I*(-3.38093633526544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.81864117210724E-01+I*(-3.97087861609725E-01):b := 6.68974446692625E-01+I*(5.58871706910840E-01):c := -1.12495535072771E+00+I*(-1.45477927527711E+00):d := -3.53598409986332E-01+I*(5.75307195619691E-01):e := 2.52369073660620E-01+I*(-6.86411446111537E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08370667828257E+00+I*(-1.22513544395482E-01):b := 6.50566074405059E-01+I*(9.11794441481042E-01):c := -9.03592859514889E-01+I*(-1.65741985429343E+00):d := -3.20656064616336E-01+I*(6.45542261666657E-01):e := 1.15704814093464E-01+I*(-1.00812365276348E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.85229637221207E-01+I*(1.53285721925404E-01):b := 4.09610082148886E-01+I*(1.17031626752796E+00):c := -6.03764499794934E-01+I*(-1.67036247719835E+00):d := -3.40566994222849E-01+I*(7.20520375161877E-01):e := 1.22512098093517E-01+I*(-1.93456157891833E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.32511495989646E-01+I*(3.01260395473973E-01):b := 5.88524566283316E-02+I*(1.21347194949417E+00):c := -3.65763293301861E-01+I*(-1.48755114689341E+00):d := -4.04014653557650E-01+I*(7.65158443512027E-01):e := 3.19400231036062E+00+I*(-1.27794544821563E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.43801881519421E-01+I*(2.52171481941538E-01):b := -2.37583410938753E-01+I*(1.02106846416572E+00):c := -3.00952649642552E-01+I*(-1.19452531654994E+00):d := -4.81311177675798E-01+I*(7.58569818439202E-01):e := 1.39499458398616E+00+I*(1.00102129078052E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.54191231071105E-01+I*(2.89882295324305E-02):b := -3.40991883600035E-01+I*(6.83133540654327E-01):c := -4.39658189275272E-01+I*(-9.28395028804980E-01):d := -5.36288663887235E-01+I*(7.03837390839387E-01):e := 8.57710718035450E-01+I*(-8.30525772208451E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.52400475277116E-01+I*(-2.63859437545569E-01):b := -2.02986987740142E-01+I*(3.57790685399310E-01):c := -7.16978048665508E-01+I*(-8.13685603003098E-01):d := -5.43222535386931E-01+I*(6.26571071869714E-01):e := 6.31289333637685E-01+I*(-2.36721773642604E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.39267528675495E-01+I*(-4.89344841227378E-01):b := 1.11857252114509E-01+I*(1.97271436157562E-01):c := -1.00315118353764E+00+I*(-9.04070854330255E-01):d := -4.98868356638779E-01+I*(5.62924630895574E-01):e := 4.88442696679888E-01+I*(-3.68399262667802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.27355220185174E-01+I*(-5.41960855139157E-01):b := 4.56221717031963E-01+I*(2.76684533622037E-01):c := -1.16427400362488E+00+I*(-1.15725851917030E+00):d := -4.23979940820829E-01+I*(5.42678945000168E-01):e := 3.71012478695344E-01+I*(-5.05819075565737E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.27166899546554E-01+I*(-1.85579935866695E-01):b := 7.67210146455212E-01+I*(6.22392975062059E-01):c := -9.22960960867059E-01+I*(-1.41161302664404E+00):d := -3.41573482427263E-01+I*(2.68716817094313E-01):e := 7.66805954100566E-01+I*(-1.18597940958544E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.29009460618401E-01+I*(8.89943813475484E-02):b := 7.48801774167646E-01+I*(9.75315709632261E-01):c := -7.01598469654233E-01+I*(-1.61425360566036E+00):d := -3.08631137057267E-01+I*(3.38951883141278E-01):e := 2.94150604067980E-01+I*(-3.41954390732044E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.30532419557036E-01+I*(3.64793647668435E-01):b := 5.07845781911473E-01+I*(1.23383753567917E+00):c := -4.01770109934277E-01+I*(-1.62719622856528E+00):d := -3.28542066663780E-01+I*(4.13929996636499E-01):e := -1.64807313006460E+00+I*(5.23090939821585E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.77814278325475E-01+I*(5.12768321217003E-01):b := 1.57088156390918E-01+I*(1.27699321764539E+00):c := -1.63768903441204E-01+I*(-1.44438489826035E+00):d := -3.91989725998582E-01+I*(4.58568064986649E-01):e := 4.92406157366640E-01+I*(1.56711951840613E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.89104663855251E-01+I*(4.63679407684569E-01):b := -1.39347711176166E-01+I*(1.08458973231694E+00):c := -9.89582597818958E-02+I*(-1.15135906791687E+00):d := -4.69286250116729E-01+I*(4.51979439913824E-01):e := 6.66360719750905E-01+I*(7.87916305881373E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.94940134069356E-02+I*(2.40496155275461E-01):b := -2.42756183837448E-01+I*(7.46654808805546E-01):c := -2.37663799414616E-01+I*(-8.85228780171913E-01):d := -5.24263736328166E-01+I*(3.97247012314009E-01):e := 7.24953038428749E-01+I*(3.91726221539940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.77032576129462E-02+I*(-5.23515118025383E-02):b := -1.04751287977555E-01+I*(4.21311953550529E-01):c := -5.14983658804851E-01+I*(-7.70519354370031E-01):d := -5.31197607827862E-01+I*(3.19980693344335E-01):e := 7.55817991602060E-01+I*(9.75646855485307E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.84570311011325E-01+I*(-2.77836915484347E-01):b := 2.10092951877096E-01+I*(2.60792704308781E-01):c := -8.01156793676985E-01+I*(-8.60904605697188E-01):d := -4.86843429079710E-01+I*(2.56334252370195E-01):e := 7.75622679282447E-01+I*(-1.88236529077688E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.72658002521004E-01+I*(-3.30452929396126E-01):b := 5.54457416794550E-01+I*(3.40205801773257E-01):c := -9.62279613764221E-01+I*(-1.11409227053723E+00):d := -4.11955013261759E-01+I*(2.36088566474789E-01):e := 7.86397989281565E-01+I*(-5.48507054017507E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.72707281570829E-01+I*(-1.22992919443135E-01):b := 8.01632374255067E-01+I*(7.34197780185449E-01):c := -7.95971010751079E-01+I*(-1.24870627071977E+00):d := -1.35289356926511E-01+I*(4.15844357535512E-02):e := 1.31512990833350E+00+I*(-1.87140559811228E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.74549842642675E-01+I*(1.51581397771109E-01):b := 7.83224001967501E-01+I*(1.08712051475565E+00):c := -5.74608519538253E-01+I*(-1.45134684973609E+00):d := -1.02347011556515E-01+I*(1.11819501800516E-01):e := 1.62414013399472E+00+I*(1.18952479184278E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.76072801581311E-01+I*(4.27380664091995E-01):b := 5.42268009711328E-01+I*(1.34564234080256E+00):c := -2.74780159818297E-01+I*(-1.46428947264100E+00):d := -1.22257941163028E-01+I*(1.86797615295737E-01):e := 4.74023028799302E-01+I*(1.11896904217739E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23354660349751E-01+I*(5.75355337640564E-01):b := 1.91510384190773E-01+I*(1.38879802276878E+00):c := -3.67789533252239E-02+I*(-1.28147814233607E+00):d := -1.85705600497829E-01+I*(2.31435683645887E-01):e := 3.34712886670382E-01+I*(6.98234696499934E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46450458795258E-02+I*(5.26266424108129E-01):b := -1.04925483376312E-01+I*(1.19639453744033E+00):c := 2.80316903340843E-02+I*(-9.88452311992595E-01):d := -2.63002124615977E-01+I*(2.24847058573061E-01):e := 3.63492103421202E-01+I*(4.80418112186961E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.54965604568790E-01+I*(3.03083171699021E-01):b := -2.08333956037594E-01+I*(8.58459613928936E-01):c := -1.10673849298635E-01+I*(-7.22322024247638E-01):d := -3.17979610827414E-01+I*(1.70114630973247E-01):e := 4.20734802002591E-01+I*(3.38323014493114E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.56756360362779E-01+I*(1.02355046210218E-02):b := -7.03290601777008E-02+I*(5.33116758673919E-01):c := -3.87993708688871E-01+I*(-6.07612598445755E-01):d := -3.24913482327109E-01+I*(9.28483120035733E-02):e := 4.96488342621035E-01+I*(2.22550303849840E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.01106930355994E-02+I*(-2.15249899060787E-01):b := 2.44515179676950E-01+I*(3.72597509432172E-01):c := -6.74166843561005E-01+I*(-6.97997849772912E-01):d := -2.80559303578958E-01+I*(2.92018710294332E-02):e := 6.07713212984528E-01+I*(1.09960169140591E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.18198384545279E-01+I*(-2.67865912972566E-01):b := 5.88879644594404E-01+I*(4.52010606896647E-01):c := -8.35289663648241E-01+I*(-9.51185514612955E-01):d := -2.05670887761007E-01+I*(8.95618513402728E-03):e := 8.12111998935213E-01+I*(-8.49138549815934E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.37549746538034E-01+I*(-2.38611972900837E-01):b := 7.56134587144187E-01+I*(8.41971411391776E-01):c := -8.03405509375130E-01+I*(-1.04228488910817E+00):d := 1.68731331601439E-01+I*(1.87817121986454E-04):e := 6.89646390042707E-01+I*(9.44109247226474E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.39392307609881E-01+I*(3.59623443134064E-02):b := 7.37726214856622E-01+I*(1.19489414596198E+00):c := -5.82043018162304E-01+I*(-1.24492546812449E+00):d := 2.01673676971435E-01+I*(7.04228831689517E-02):e := 7.70367547196411E-01+I*(3.61466025458474E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.40915266548516E-01+I*(3.11761610634293E-01):b := 4.96770222600448E-01+I*(1.45341597200889E+00):c := -2.82214658442348E-01+I*(-1.25786809102941E+00):d := 1.81762747364921E-01+I*(1.45400996664172E-01):e := 5.18891696247820E-01+I*(5.07964132940352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.81971253169559E-02+I*(4.59736284182861E-01):b := 1.46012597079894E-01+I*(1.49657165397511E+00):c := -4.42134519492747E-02+I*(-1.07505676072448E+00):d := 1.18315088030120E-01+I*(1.90039065014322E-01):e := 3.62499553528811E-01+I*(4.06681666635218E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.00512489153269E-01+I*(4.10647370650428E-01):b := -1.50423270487191E-01+I*(1.30416816864665E+00):c := 2.05971917100336E-02+I*(-7.82030930381000E-01):d := 4.10185639119723E-02+I*(1.83450439941497E-01):e := 3.25755283412652E-01+I*(2.99284203563012E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.90123139601585E-01+I*(1.87464118241319E-01):b := -2.53831743148473E-01+I*(9.66233245135264E-01):c := -1.18108347922686E-01+I*(-5.15900642636043E-01):d := -1.39589222994647E-02+I*(1.28718012341682E-01):e := 3.34131776507564E-01+I*(2.16727857021903E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91913895395574E-01+I*(-1.05383548836680E-01):b := -1.15826847288580E-01+I*(6.40890389880246E-01):c := -3.95428207312922E-01+I*(-4.01191216834161E-01):d := -2.08927937991600E-02+I*(5.14516933720083E-02):e := 3.66033512620902E-01+I*(1.49751824559162E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.05046841997196E-01+I*(-3.30868952518489E-01):b := 1.99017392566070E-01+I*(4.80371140638499E-01):c := -6.81601342185056E-01+I*(-4.91576468161318E-01):d := 2.34613849489917E-02+I*(-1.21947476021316E-02):e := 4.22904270592596E-01+I*(9.25797349125993E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.30408495124839E-02+I*(-3.83484966430268E-01):b := 5.43381857483525E-01+I*(5.59784238102974E-01):c := -8.42724162272291E-01+I*(-7.44764133001361E-01):d := 9.83498007669421E-02+I*(-3.24404334975374E-02):e := 5.22476689471806E-01+I*(5.31751378722062E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31727118574902E-01+I*(-4.78337656164294E-01):b := 6.52005705363334E-01+I*(8.95285388869108E-01):c := -9.41785772207768E-01+I*(-8.88935740383442E-01):d := 4.28233924180768E-01+I*(1.63896899129497E-01):e := 4.83988523359885E-01+I*(-1.73183685507045E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.33569679646748E-01+I*(-2.03763338950051E-01):b := 6.33597333075768E-01+I*(1.24820812343931E+00):c := -7.20423280994943E-01+I*(-1.09157631939976E+00):d := 4.61176269550764E-01+I*(2.34131965176462E-01):e := 5.76297176717858E-01+I*(7.79492949170787E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35092638585384E-01+I*(7.20359273708356E-02):b := 3.92641340819596E-01+I*(1.50672994948622E+00):c := -4.20594921274988E-01+I*(-1.10451894230468E+00):d := 4.41265339944251E-01+I*(3.09110078671682E-01):e := 5.20457888356669E-01+I*(2.22593432756231E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.76255026461768E-02+I*(2.20010600919404E-01):b := 4.18837152990404E-02+I*(1.54988563145244E+00):c := -1.82593714781914E-01+I*(-9.21707611999744E-01):d := 3.77817680609450E-01+I*(3.53748147021832E-01):e := 3.97870249802336E-01+I*(2.35434206891212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.06335117116402E-01+I*(1.70921687386970E-01):b := -2.54552152268044E-01+I*(1.35748214612398E+00):c := -1.17783071122606E-01+I*(-6.28681781656268E-01):d := 3.00521156491302E-01+I*(3.47159521949007E-01):e := 3.33953132661331E-01+I*(1.82665872138277E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.95945767564717E-01+I*(-5.22615650221381E-02):b := -3.57960624929326E-01+I*(1.01954722261260E+00):c := -2.56488610755326E-01+I*(-3.62551493911310E-01):d := 2.45543670279865E-01+I*(2.92427094349193E-01):e := 3.13931459901834E-01+I*(1.25457296870943E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.97736523358706E-01+I*(-3.45109232100138E-01):b := -2.19955729069433E-01+I*(6.94204367357578E-01):c := -5.33808470145561E-01+I*(-2.47842068109428E-01):d := 2.38609798780170E-01+I*(2.15160775379519E-01):e := 3.18509490627435E-01+I*(7.36055429029469E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.10869469960328E-01+I*(-5.70594635781947E-01):b := 9.48885107852177E-02+I*(5.33685118115830E-01):c := -8.19981605017695E-01+I*(-3.38227319436585E-01):d := 2.82963977528322E-01+I*(1.51514334405379E-01):e := 3.43151625364180E-01+I*(2.66880249608337E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.27817784506482E-02+I*(-6.23210649693725E-01):b := 4.39252975702672E-01+I*(6.13098215580306E-01):c := -9.81104425104931E-01+I*(-5.91414984276628E-01):d := 3.57852393346272E-01+I*(1.31268648509973E-01):e := 3.94198878521172E-01+I*(-1.18039352200593E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.04754981392887E-01+I*(-7.29999657780336E-01):b := 5.37968789961383E-01+I*(8.69193510036942E-01):c := -1.14636213634429E+00+I*(-8.60412595519822E-01):d := 5.21794273693547E-01+I*(4.56110382880987E-01):e := 3.87321674280349E-01+I*(-1.12423024642293E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.06597542464734E-01+I*(-4.55425340566092E-01):b := 5.19560417673817E-01+I*(1.22211624460714E+00):c := -9.24999645131467E-01+I*(-1.06305317453614E+00):d := 5.54736619063544E-01+I*(5.26345448927952E-01):e := 4.77155282632834E-01+I*(-9.12995047239369E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.08120501403370E-01+I*(-1.79626074245206E-01):b := 2.78604425417645E-01+I*(1.48063807065406E+00):c := -6.25171285411512E-01+I*(-1.07599579744106E+00):d := 5.34825689457030E-01+I*(6.01323562423172E-01):e := 5.14124708772314E-01+I*(2.04793826124814E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54023601718087E-02+I*(-3.16514006966374E-02):b := -7.21532001029113E-02+I*(1.52379375262027E+00):c := -3.87170078918437E-01+I*(-8.93184467136124E-01):d := 4.71378030122229E-01+I*(6.45961630773322E-01):e := 4.37284182231434E-01+I*(9.71630076659494E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.33307254298416E-01+I*(-8.07403142290719E-02):b := -3.68589067669996E-01+I*(1.33139026729182E+00):c := -3.22359435259130E-01+I*(-6.00158636792647E-01):d := 3.94081506004081E-01+I*(6.39373005700497E-01):e := 3.59662774803509E-01+I*(8.82348585096697E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.22917904746731E-01+I*(-3.03923566638179E-01):b := -4.71997540331277E-01+I*(9.93455343780429E-01):c := -4.61064974891849E-01+I*(-3.34028349047691E-01):d := 3.39104019792644E-01+I*(5.84640578100682E-01):e := 3.18498787089521E-01+I*(4.99255759569073E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.24708660540721E-01+I*(-5.96771233716179E-01):b := -3.33992644471385E-01+I*(6.68112488525412E-01):c := -7.38384834282085E-01+I*(-2.19318923245809E-01):d := 3.32170148292948E-01+I*(5.07374259131008E-01):e := 3.03058166035436E-01+I*(6.56410283566462E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.37841607142342E-01+I*(-8.22256637397988E-01):b := -1.91484046167339E-02+I*(5.07593239283664E-01):c := -1.02455796915422E+00+I*(-3.09704174572965E-01):d := 3.76524327041100E-01+I*(4.43727818156869E-01):e := 3.06545870009723E-01+I*(-3.73888115330673E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02460843673371E-02+I*(-8.74872651309767E-01):b := 3.25216060300721E-01+I*(5.87006336748140E-01):c := -1.18568078924145E+00+I*(-5.62891839413008E-01):d := 4.51412742859051E-01+I*(4.23482132261463E-01):e := 3.31049303819575E-01+I*(-8.04605555629410E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.22462786365166E-01+I*(-8.75842530281214E-01):b := 4.67382981034047E-01+I*(7.75904454979780E-01):c := -1.32141104739219E+00+I*(-9.70061750998448E-01):d := 4.05634452795284E-01+I*(7.40098331738009E-01):e := 3.25928603756442E-01+I*(-2.00182102415775E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.24305347437012E-01+I*(-6.01268213066971E-01):b := 4.48974608746482E-01+I*(1.12882718954998E+00):c := -1.10004855617936E+00+I*(-1.17270233001477E+00):d := 4.38576798165280E-01+I*(8.10333397784974E-01):e := 4.04172640974544E-01+I*(-2.30167579008806E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.25828306375648E-01+I*(-3.25468946746084E-01):b := 2.08018616490309E-01+I*(1.38734901559690E+00):c := -8.00220196459409E-01+I*(-1.18564495291968E+00):d := 4.18665868558767E-01+I*(8.85311511280195E-01):e := 5.02601480949481E-01+I*(-1.68539511611838E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73110165144087E-01+I*(-1.77494273197516E-01):b := -1.42739009030246E-01+I*(1.43050469756311E+00):c := -5.62218989966335E-01+I*(-1.00283362261475E+00):d := 3.55218209223965E-01+I*(9.29949579630345E-01):e := 4.89195258648088E-01+I*(-4.65791692776523E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.55994493261375E-02+I*(-2.26583186729950E-01):b := -4.39174876597330E-01+I*(1.23810121223466E+00):c := -4.97408346307028E-01+I*(-7.09807792271273E-01):d := 2.77921685105818E-01+I*(9.23360954557519E-01):e := 4.04930065470654E-01+I*(-5.53182823873123E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.05210099774453E-01+I*(-4.49766439139058E-01):b := -5.42583349258613E-01+I*(9.00166288723268E-01):c := -6.36113885939747E-01+I*(-4.43677504526316E-01):d := 2.22944198894381E-01+I*(8.68628526957705E-01):e := 3.41963617632690E-01+I*(-2.31131732830062E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.07000855568442E-01+I*(-7.42614106217057E-01):b := -4.04578453398720E-01+I*(5.74823433468250E-01):c := -9.13433745329982E-01+I*(-3.28968078724434E-01):d := 2.16010327394685E-01+I*(7.91362207988032E-01):e := 3.06620518858213E-01+I*(-5.90554865576759E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.01338021700633E-02+I*(-9.68099509898867E-01):b := -8.97342135440690E-02+I*(4.14304184226503E-01):c := -1.19960688020212E+00+I*(-4.19353330051591E-01):d := 2.60364506142837E-01+I*(7.27715767013892E-01):e := 2.91176183847679E-01+I*(-1.01706585069587E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67953889339616E-01+I*(-1.02071552381065E+00):b := 2.54630251373385E-01+I*(4.93717281690978E-01):c := -1.36072970028935E+00+I*(-6.72540994891635E-01):d := 3.35252921960787E-01+I*(7.07470081118486E-01):e := 2.94587887966863E-01+I*(-1.49580511455067E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.82982631992468E-01+I*(-8.47624772760788E-01):b := 4.73276163052313E-01+I*(6.59069209351230E-01):c := -1.38502517442021E+00+I*(-1.16657714835625E+00):d := 1.34106932656885E-01+I*(8.82979628255877E-01):e := 2.78990108402420E-01+I*(-2.97870016217964E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.84825193064314E-01+I*(-5.73050455546545E-01):b := 4.54867790764747E-01+I*(1.01199194392143E+00):c := -1.16366268320738E+00+I*(-1.36921772737257E+00):d := 1.67049278026882E-01+I*(9.53214694302842E-01):e := 3.34490565285074E-01+I*(-3.77336530177173E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.86348152002950E-01+I*(-2.97251189225658E-01):b := 2.13911798508575E-01+I*(1.27051376996834E+00):c := -8.63834323487426E-01+I*(-1.38216035027748E+00):d := 1.47138348420368E-01+I*(1.02819280779806E+00):e := 4.81377474683892E-01+I*(-3.97264883494969E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.33630010771390E-01+I*(-1.49276515677089E-01):b := -1.36845827011980E-01+I*(1.31366945193456E+00):c := -6.25833116994352E-01+I*(-1.19934901997255E+00):d := 8.36906890855665E-02+I*(1.07283087614821E+00):e := 5.78674259729185E-01+I*(-2.40797857757294E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.44920396301165E-01+I*(-1.98365429209524E-01):b := -4.33281694579065E-01+I*(1.12126596660611E+00):c := -5.61022473335044E-01+I*(-9.06323189629073E-01):d := 6.39416496741880E-03+I*(1.06624225107539E+00):e := 4.94124562036657E-01+I*(-1.17011904896570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.53097458528493E-02+I*(-4.21548681618631E-01):b := -5.36690167240347E-01+I*(7.83331043094717E-01):c := -6.99728012967764E-01+I*(-6.40192901884116E-01):d := -4.85833212440183E-02+I*(1.01150982347557E+00):e := 3.96897283813079E-01+I*(-1.03813435013477E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.35189900588597E-02+I*(-7.14396348696631E-01):b := -3.98685271380454E-01+I*(4.57988187839700E-01):c := -9.77047872357999E-01+I*(-5.25483476082234E-01):d := -5.55171927437134E-02+I*(9.34243504505899E-01):e := 3.33571757495147E-01+I*(-1.32009247480933E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.40386043457238E-01+I*(-9.39881752378440E-01):b := -8.38410315258033E-02+I*(2.97468938597952E-01):c := -1.26322100723013E+00+I*(-6.15868727409390E-01):d := -1.11630139955616E-02+I*(8.70597063531759E-01):e := 2.94780250134493E-01+I*(-1.75029474790540E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.28473734966917E-01+I*(-9.92497766290219E-01):b := 2.60523433391651E-01+I*(3.76882036062427E-01):c := -1.42434382731737E+00+I*(-8.69056392249433E-01):d := 6.37254018223890E-02+I*(8.50351377636353E-01):e := 2.74746553509076E-01+I*(-2.29221181470866E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01992747750924E+00+I*(-6.71057264839055E-01):b := 3.21040474536038E-01+I*(4.53418955245544E-01):c := -9.01038251930647E-01+I*(-1.58351187392788E+00):d := -3.82085012474124E-01+I*(8.97787262014480E-01):e := 5.37352503502204E-02+I*(-4.08684359201455E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.12177003858109E+00+I*(-3.96482947624812E-01):b := 3.02632102248472E-01+I*(8.06341689815746E-01):c := -6.79675760717821E-01+I*(-1.78615245294420E+00):d := -3.49142667104128E-01+I*(9.68022328061445E-01):e := -9.78855024223702E-03+I*(-4.75769492703082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.02329299751972E+00+I*(-1.20683681303925E-01):b := 6.16761099922989E-02+I*(1.06486351586266E+00):c := -3.79847400997865E-01+I*(-1.79909507584911E+00):d := -3.69053596710641E-01+I*(1.04300044155667E+00):e := -4.56502963369815E-02+I*(-6.07528458538548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.70574856288163E-01+I*(2.72909922446428E-02):b := -2.89081515528255E-01+I*(1.10801919782887E+00):c := -1.41846194504792E-01+I*(-1.61628374554418E+00):d := -4.32501256045442E-01+I*(1.08763850990682E+00):e := 7.49079382353226E-02+I*(-8.06109579772961E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.81865241817938E-01+I*(-2.17979212877915E-02):b := -5.85517383095340E-01+I*(9.15615712500420E-01):c := -7.70355508454843E-02+I*(-1.32325791520070E+00):d := -5.09797780163590E-01+I*(1.08104988483399E+00):e := 3.82587838378471E-01+I*(-7.34697359157084E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.92254591369623E-01+I*(-2.44981173696899E-01):b := -6.88925855756622E-01+I*(5.77680788989031E-01):c := -2.15741090478203E-01+I*(-1.05712762745574E+00):d := -5.64775266375027E-01+I*(1.02631745723418E+00):e := 3.96437926655712E-01+I*(-4.89371697742929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.90463835575633E-01+I*(-5.37828840774899E-01):b := -5.50920959896730E-01+I*(2.52337933734014E-01):c := -4.93060949868440E-01+I*(-9.42418201653863E-01):d := -5.71709137874723E-01+I*(9.49051138264502E-01):e := 2.92281028606584E-01+I*(-3.89338196300392E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.77330888974012E-01+I*(-7.63314244456708E-01):b := -2.36076720042079E-01+I*(9.18186844922661E-02):c := -7.79234084740574E-01+I*(-1.03280345298102E+00):d := -5.27354959126571E-01+I*(8.85404697290362E-01):e := 1.99647303150899E-01+I*(-3.65843487993934E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.65418580483691E-01+I*(-8.15930258368487E-01):b := 1.08287744875376E-01+I*(1.71231781956742E-01):c := -9.40356904827810E-01+I*(-1.28599111782106E+00):d := -4.52466543308620E-01+I*(8.65159011394957E-01):e := 1.22718636742510E-01+I*(-3.75263167794648E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03737720756976E+00+I*(-4.09595338880475E-01):b := 4.37124070574252E-01+I*(4.38934379096378E-01):c := -7.18554842258698E-01+I*(-1.68028410006085E+00):d := -5.69945880103810E-01+I*(6.55195931789022E-01):e := -5.12065866216272E-02+I*(-5.11980865841985E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.13921976864160E+00+I*(-1.35021021666231E-01):b := 4.18715698286686E-01+I*(7.91857113666580E-01):c := -4.97192351045872E-01+I*(-1.88292467907717E+00):d := -5.37003534733814E-01+I*(7.25430997835987E-01):e := -1.86723481863931E-01+I*(-5.50319194351549E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04074272758024E+00+I*(1.40778244654655E-01):b := 1.77759706030513E-01+I*(1.05037893971349E+00):c := -1.97363991325917E-01+I*(-1.89586730198208E+00):d := -5.56914464340327E-01+I*(8.00409111331208E-01):e := -3.59823272185404E-01+I*(-6.62775697903965E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.88024586348680E-01+I*(2.88752918203223E-01):b := -1.72997919490041E-01+I*(1.09353462167971E+00):c := 4.06372151671558E-02+I*(-1.71305597167715E+00):d := -6.20362123675128E-01+I*(8.45047179681358E-01):e := -5.40439322652391E-01+I*(-1.03672345322016E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.99314971878455E-01+I*(2.39664004670789E-01):b := -4.69433787057126E-01+I*(9.01131136351254E-01):c := 1.05447858826464E-01+I*(-1.42003014133367E+00):d := -6.97658647793276E-01+I*(8.38458554608532E-01):e := 1.32542829464616E-01+I*(-1.65799828250270E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09704321430139E-01+I*(1.64807522616814E-02):b := -5.72842259718408E-01+I*(5.63196212839865E-01):c := -3.32576808062552E-02+I*(-1.15389985358871E+00):d := -7.52636134004713E-01+I*(7.83726127008718E-01):e := 5.96552600686840E-01+I*(-9.28484275855223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.07913565636150E-01+I*(-2.76366914816318E-01):b := -4.34837363858515E-01+I*(2.37853357584848E-01):c := -3.10577540196491E-01+I*(-1.03919042778683E+00):d := -7.59570005504409E-01+I*(7.06459808039044E-01):e := 3.81741299994434E-01+I*(-6.17975878109475E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.94780619034529E-01+I*(-5.01852318498127E-01):b := -1.19993124003864E-01+I*(7.73341083431004E-02):c := -5.96750675068625E-01+I*(-1.12957567911399E+00):d := -7.15215826756257E-01+I*(6.42813367064904E-01):e := 2.07589691891222E-01+I*(-5.30486662680914E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.82868310544208E-01+I*(-5.54468332409906E-01):b := 2.24371340913590E-01+I*(1.56747205807576E-01):c := -7.57873495155860E-01+I*(-1.38276334395403E+00):d := -6.40327410938306E-01+I*(6.22567681169498E-01):e := 7.25733600698487E-02+I*(-5.06147432377752E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.82679989905588E-01+I*(-1.98087413137444E-01):b := 5.35359770336840E-01+I*(5.02455647247597E-01):c := -5.16560452398042E-01+I*(-1.63711785142778E+00):d := -5.57920952544740E-01+I*(3.48605553263644E-01):e := -1.72371408457719E-01+I*(-7.64274596269365E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.84522550977434E-01+I*(7.64869040767999E-02):b := 5.16951398049273E-01+I*(8.55378381817800E-01):c := -2.95197961185216E-01+I*(-1.83975843044410E+00):d := -5.24978607174745E-01+I*(4.18840619310609E-01):e := -4.94425430917098E-01+I*(-7.26447485318186E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.86045509916070E-01+I*(3.52286170397686E-01):b := 2.75995405793100E-01+I*(1.11390020786471E+00):c := 4.63039853473958E-03+I*(-1.85270105334901E+00):d := -5.44889536781258E-01+I*(4.93818732805829E-01):e := -9.65733150841551E-01+I*(-6.39175494947915E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.33327368684509E-01+I*(5.00260843946254E-01):b := -7.47622197274539E-02+I*(1.15705588983093E+00):c := 2.42631605027812E-01+I*(-1.66988972304408E+00):d := -6.08337196116059E-01+I*(5.38456801155979E-01):e := -2.02902967660586E+00+I*(-2.92971406650112E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.44617754214284E-01+I*(4.51171930413819E-01):b := -3.71198087294539E-01+I*(9.64652404502472E-01):c := 3.07442248687120E-01+I*(-1.37686389270060E+00):d := -6.85633720234207E-01+I*(5.31868176083154E-01):e := -4.13026364409859E+00+I*(9.35620384709928E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55007103765969E-01+I*(2.27988678004712E-01):b := -4.74606559955821E-01+I*(6.26717480991084E-01):c := 1.68736709054401E-01+I*(-1.11073360495565E+00):d := -7.40611206445644E-01+I*(4.77135748483340E-01):e := 2.40470108457093E+00+I*(-4.39658877040860E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.53216347971980E-01+I*(-6.48589890732875E-02):b := -3.36601664095928E-01+I*(3.01374625736067E-01):c := -1.08583150335835E-01+I*(-9.96024179153765E-01):d := -7.47545077945339E-01+I*(3.99869429513666E-01):e := 9.97915745595864E-01+I*(-7.56916590783412E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.40083401370358E-01+I*(-2.90344392755097E-01):b := -2.17574242412772E-02+I*(1.40855376494320E-01):c := -3.94756285207969E-01+I*(-1.08640943048092E+00):d := -7.03190899197188E-01+I*(3.36222988539526E-01):e := 4.60287914957622E-01+I*(-7.88370287316034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.28171092880038E-01+I*(-3.42960406666875E-01):b := 3.22607040676177E-01+I*(2.20268473958795E-01):c := -5.55879105295204E-01+I*(-1.33959709532096E+00):d := -6.28302483379237E-01+I*(3.15977302644120E-01):e := 1.19493856628886E-01+I*(-7.83604796203029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.28220371929863E-01+I*(-1.35500396713884E-01):b := 5.69781998136694E-01+I*(6.14260452370987E-01):c := -3.89570502282062E-01+I*(-1.47421109550350E+00):d := -3.51636827043988E-01+I*(1.21473171922882E-01):e := 2.12755039587307E-01+I*(-1.48161979888674E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.30062933001709E-01+I*(1.39073920500360E-01):b := 5.51373625849128E-01+I*(9.67183186941190E-01):c := -1.68208011069236E-01+I*(-1.67685167451982E+00):d := -3.18694481673992E-01+I*(1.91708237969847E-01):e := -1.34000321459438E+00+I*(-1.80835565659576E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.31585891940344E-01+I*(4.14873186821245E-01):b := 3.10417633592954E-01+I*(1.22570501298810E+00):c := 1.31620348650719E-01+I*(-1.68979429742474E+00):d := -3.38605411280506E-01+I*(2.66686351465067E-01):e := -2.64776863844526E+00+I*(8.24594943375505E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78867750708784E-01+I*(5.62847860369814E-01):b := -4.03399919275999E-02+I*(1.26886069495432E+00):c := 3.69621555143793E-01+I*(-1.50698296711980E+00):d := -4.02053070615307E-01+I*(3.11324419815217E-01):e := -3.88077324108194E-01+I*(1.86441875608634E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.01581362385595E-02+I*(5.13758946837380E-01):b := -3.36775859494684E-01+I*(1.07645720962586E+00):c := 4.34432198803100E-01+I*(-1.21395713677633E+00):d := -4.79349594733454E-01+I*(3.04735794742392E-01):e := 5.93782013276666E-01+I*(1.18874800923538E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.94525142097562E-02+I*(2.90575694428272E-01):b := -4.40184332155967E-01+I*(7.38522286114475E-01):c := 2.95726659170381E-01+I*(-9.47826849031371E-01):d := -5.34327080944892E-01+I*(2.50003367142578E-01):e := 8.98705543121345E-01+I*(5.89251185976262E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.01243270003746E-01+I*(-2.27197264972748E-03):b := -3.02179436296074E-01+I*(4.13179430859457E-01):c := 1.84067997801452E-02+I*(-8.33117423229489E-01):d := -5.41260952444587E-01+I*(1.72737048172904E-01):e := 9.78441107465574E-01+I*(9.79526907096568E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.56237833946330E-02+I*(-2.27757376331536E-01):b := 1.26648035585771E-02+I*(2.52660181617710E-01):c := -2.67766335091989E-01+I*(-9.23502674556646E-01):d := -4.96906773696435E-01+I*(1.09090607198764E-01):e := 9.35085349421584E-01+I*(-3.64915038305544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73711474904312E-01+I*(-2.80373390243315E-01):b := 3.57029268476032E-01+I*(3.32073279082185E-01):c := -4.28889155179224E-01+I*(-1.17669033939669E+00):d := -4.22018357878485E-01+I*(8.88449213033580E-02):e := 7.44337747587880E-01+I*(-8.72438217596635E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.93062836897068E-01+I*(-2.51119450171586E-01):b := 5.24284211025814E-01+I*(7.22034083577314E-01):c := -3.97005000906113E-01+I*(-1.26778971389191E+00):d := -4.76161385160391E-02+I*(8.00765532913173E-02):e := 9.69060838758867E-01+I*(-5.82439681842414E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.94905397968914E-01+I*(2.34548670426574E-02):b := 5.05875838738248E-01+I*(1.07495681814752E+00):c := -1.75642509693287E-01+I*(-1.47043029290823E+00):d := -1.46737931460432E-02+I*(1.50311619338282E-01):e := 2.19283667841582E+00+I*(-8.32398104081900E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.96428356907550E-01+I*(2.99254133363544E-01):b := 2.64919846482075E-01+I*(1.33347864419443E+00):c := 1.24185850026668E-01+I*(-1.48337291581314E+00):d := -3.45847227525567E-02+I*(2.25289732833503E-01):e := 1.59771872093208E+00+I*(1.56794826329181E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.43710215675990E-01+I*(4.47228806912112E-01):b := -8.58377790384788E-02+I*(1.37663432616064E+00):c := 3.62187056519742E-01+I*(-1.30056158550821E+00):d := -9.80323820873579E-02+I*(2.69927801183653E-01):e := 6.72191715708664E-01+I*(8.69998734607397E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.44999398794236E-01+I*(3.98139893379678E-01):b := -3.82273646605564E-01+I*(1.18423084083219E+00):c := 4.26997700179050E-01+I*(-1.00753575516473E+00):d := -1.75328906205506E-01+I*(2.63339176110827E-01):e := 5.64220546298913E-01+I*(4.96197924719265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.34610049242551E-01+I*(1.74956640970570E-01):b := -4.85682119266846E-01+I*(8.46295917320802E-01):c := 2.88292160546330E-01+I*(-7.41405467419777E-01):d := -2.30306392416943E-01+I*(2.08606748511013E-01):e := 5.56520840636255E-01+I*(2.76425482964806E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.36400805036540E-01+I*(-1.17891026107429E-01):b := -3.47677223406953E-01+I*(5.20953062065785E-01):c := 1.09723011560944E-02+I*(-6.26696041617895E-01):d := -2.37240263916638E-01+I*(1.31340429541339E-01):e := 5.77611869875661E-01+I*(1.05856462973194E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.49533751638162E-01+I*(-3.43376429789239E-01):b := -3.28329835523023E-02+I*(3.60433812824037E-01):c := -2.75200833716040E-01+I*(-7.17081292945051E-01):d := -1.92886085168486E-01+I*(6.76939885671990E-02):e := 6.22435735339254E-01+I*(-6.12232094497768E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.38553939871518E-01+I*(-3.95992443701017E-01):b := 3.11531481365152E-01+I*(4.39846910288513E-01):c := -4.36323653803275E-01+I*(-9.70268957785095E-01):d := -1.17997669350536E-01+I*(4.74483026717934E-02):e := 7.14537215208984E-01+I*(-2.66082047941410E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.87240208933936E-01+I*(-4.90845133435043E-01):b := 4.20155329244961E-01+I*(7.75348061054646E-01):c := -5.35385263738752E-01+I*(-1.11444056516718E+00):d := 2.11886454063290E-01+I*(2.43785635298828E-01):e := 5.63867255027183E-01+I*(-2.92093278309791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.89082770005782E-01+I*(-2.16270816220800E-01):b := 4.01746956957395E-01+I*(1.12827079562485E+00):c := -3.14022772525926E-01+I*(-1.31708114418350E+00):d := 2.44828799433286E-01+I*(3.14020701345793E-01):e := 8.27412849712056E-01+I*(-3.34539262406243E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.90605728944418E-01+I*(5.95284501000866E-02):b := 1.60790964701223E-01+I*(1.38679262167176E+00):c := -1.41944128059712E-02+I*(-1.33002376708841E+00):d := 2.24917869826773E-01+I*(3.88998814841013E-01):e := 1.04053100985445E+00+I*(4.79575732902678E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78875877128569E-02+I*(2.07503123648655E-01):b := -1.89966660819332E-01+I*(1.42994830363798E+00):c := 2.23806793687103E-01+I*(-1.14721243678348E+00):d := 1.61470210491972E-01+I*(4.33636883191163E-01):e := 7.31868635962898E-01+I*(2.75954673534082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.50822026757368E-01+I*(1.58414210116221E-01):b := -4.86402528386417E-01+I*(1.23754481830952E+00):c := 2.88617437346410E-01+I*(-8.54186606440001E-01):d := 8.41736863738243E-02+I*(4.27048258118337E-01):e := 5.35705340126058E-01+I*(1.99380402741847E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.40432677205683E-01+I*(-6.47690422928870E-02):b := -5.89811001047699E-01+I*(8.99609894798134E-01):c := 1.49911897713691E-01+I*(-5.88056318695044E-01):d := 2.91962001623875E-02+I*(3.72315830518523E-01):e := 4.59231318028629E-01+I*(9.86656624162256E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.42223432999673E-01+I*(-3.57616709370887E-01):b := -4.51806105187806E-01+I*(5.74267039543117E-01):c := -1.27407961676545E-01+I*(-4.73346892893162E-01):d := 2.22623286626920E-02+I*(2.95049511548849E-01):e := 4.31812331278403E-01+I*(7.13994224713923E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.55356379601294E-01+I*(-5.83102113052696E-01):b := -1.36961865333155E-01+I*(4.13747790301369E-01):c := -4.13581096548679E-01+I*(-5.63732144220319E-01):d := 6.66165074108438E-02+I*(2.31403070574710E-01):e := 4.32451018989802E-01+I*(-8.24060746532584E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.27313119083854E-02+I*(-6.35718126964474E-01):b := 2.07402599584299E-01+I*(4.93160887765844E-01):c := -5.74703916635915E-01+I*(-8.16919809060362E-01):d := 1.41504923228794E-01+I*(2.11157384679304E-01):e := 4.64788588216756E-01+I*(-1.80613375458959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.60268071751922E-01+I*(-7.42507135051085E-01):b := 3.06118413843010E-01+I*(7.49256182222480E-01):c := -7.39961627875276E-01+I*(-1.08591742030356E+00):d := 3.05446803576069E-01+I*(5.35999119050317E-01):e := 3.61670842885403E-01+I*(-2.82779426963799E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.62110632823768E-01+I*(-4.67932817836841E-01):b := 2.87710041555444E-01+I*(1.10217891679268E+00):c := -5.18599136662450E-01+I*(-1.28855799931988E+00):d := 3.38389148946065E-01+I*(6.06234185097282E-01):e := 4.65173455704467E-01+I*(-3.55729558940805E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.63633591762404E-01+I*(-1.92133551515955E-01):b := 4.67540492992710E-02+I*(1.36070074283959E+00):c := -2.18770776942495E-01+I*(-1.30150062222479E+00):d := 3.18478219339552E-01+I*(6.81212298592503E-01):e := 6.51895271100116E-01+I*(-2.92643276975743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10915450530843E-01+I*(-4.41588779673865E-02):b := -3.04003576221284E-01+I*(1.40385642480581E+00):c := 1.92304295505786E-02+I*(-1.11868929191986E+00):d := 2.55030560004751E-01+I*(7.25850366942653E-01):e := 6.52638624761839E-01+I*(-7.16709724757796E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.77794163939382E-01+I*(-9.32477914998209E-02):b := -6.00439443788368E-01+I*(1.21145293947736E+00):c := 8.40410732098867E-02+I*(-8.25663461576382E-01):d := 1.77734035886603E-01+I*(7.19261741869827E-01):e := 5.10907115628149E-01+I*(-1.85415470736756E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67404814387697E-01+I*(-3.16431043908929E-01):b := -7.03847916449650E-01+I*(8.73518015965968E-01):c := -5.46644664228329E-02+I*(-5.59533173831425E-01):d := 1.22756549675166E-01+I*(6.64529314270013E-01):e := 4.14726340802881E-01+I*(-2.94082589577123E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.69195570181687E-01+I*(-6.09278710986928E-01):b := -5.65843020589757E-01+I*(5.48175160710950E-01):c := -3.31984325813069E-01+I*(-4.44823748029542E-01):d := 1.15822678175471E-01+I*(5.87262995300339E-01):e := 3.62288452306185E-01+I*(-7.96776705264902E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.82328516783308E-01+I*(-8.34764114668738E-01):b := -2.50998780735107E-01+I*(3.87655911469202E-01):c := -6.18157460685203E-01+I*(-5.35208999356699E-01):d := 1.60176856923622E-01+I*(5.23616554326200E-01):e := 3.36083760917075E-01+I*(-1.37452967447987E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05759174726371E-01+I*(-8.87380128580516E-01):b := 9.33656841823477E-02+I*(4.67069008933678E-01):c := -7.79280280772438E-01+I*(-7.88396664196742E-01):d := 2.35065272741572E-01+I*(5.03370868430794E-01):e := 3.31945136108790E-01+I*(-2.03954005214684E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.77975876724200E-01+I*(-8.88350007551963E-01):b := 2.35532604915675E-01+I*(6.55967127165319E-01):c := -9.15010538923174E-01+I*(-1.19556657578218E+00):d := 1.89286982677806E-01+I*(8.19987067907340E-01):e := 2.39765265167621E-01+I*(-3.09776748995692E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.79818437796046E-01+I*(-6.13775690337720E-01):b := 2.17124232628109E-01+I*(1.00888986173552E+00):c := -6.93648047710348E-01+I*(-1.39820715479850E+00):d := 2.22229328047802E-01+I*(8.90222133954306E-01):e := 2.74252687691964E-01+I*(-3.90838307266108E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.81341396734682E-01+I*(-3.37976424016834E-01):b := -2.38317596280635E-02+I*(1.26741168778243E+00):c := -3.93819687990393E-01+I*(-1.41114977770342E+00):d := 2.02318398441289E-01+I*(9.65200247449526E-01):e := 3.97641130948421E-01+I*(-4.42591274840041E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.28623255503121E-01+I*(-1.90001750468265E-01):b := -3.74589385148619E-01+I*(1.31056736974865E+00):c := -1.55818481497319E-01+I*(-1.22833844739848E+00):d := 1.38870739106487E-01+I*(1.00983831579968E+00):e := 5.30974293200712E-01+I*(-3.29140483066092E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.99136410328962E-02+I*(-2.39090664000700E-01):b := -6.71025252715703E-01+I*(1.11816388442019E+00):c := -9.10078378380111E-02+I*(-9.35312617055007E-01):d := 6.15742149883398E-02+I*(1.00324969072685E+00):e := 4.84645377436505E-01+I*(-1.83831248856692E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.49697009415419E-01+I*(-4.62273916409807E-01):b := -7.74433725376985E-01+I*(7.80228960908806E-01):c := -2.29713377470731E-01+I*(-6.69182329310050E-01):d := 6.59672877690303E-03+I*(9.48517263127036E-01):e := 3.89809450526936E-01+I*(-1.47062015711164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.51487765209408E-01+I*(-7.55121583487807E-01):b := -6.36428829517093E-01+I*(4.54886105653789E-01):c := -5.07033236860966E-01+I*(-5.54472903508168E-01):d := -3.37142722792507E-04+I*(8.71250944157362E-01):e := 3.20940086625311E-01+I*(-1.62597732410560E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.53792881889704E-02+I*(-9.80606987169616E-01):b := -3.21584589662442E-01+I*(2.94366856412041E-01):c := -7.93206371733100E-01+I*(-6.44858154835325E-01):d := 4.40170360253591E-02+I*(8.07604503183222E-01):e := 2.75479966659211E-01+I*(-1.97746279315854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23466979698649E-01+I*(-1.03322300108139E+00):b := 2.27798752550127E-02+I*(3.73779953876517E-01):c := -9.54329191820336E-01+I*(-8.98045819675368E-01):d := 1.18905451843310E-01+I*(7.87358817287816E-01):e := 2.47419985722260E-01+I*(-2.45876295015389E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.38495722351502E-01+I*(-8.60132250031537E-01):b := 2.41425786933940E-01+I*(5.39131881536768E-01):c := -9.78624665951190E-01+I*(-1.39208197313998E+00):d := -8.22405374605929E-02+I*(9.62868364425208E-01):e := 1.44921035481883E-01+I*(-3.50032982984136E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.40338283423348E-01+I*(-5.85557932817293E-01):b := 2.23017414646374E-01+I*(8.92054616106970E-01):c := -7.57262174738365E-01+I*(-1.59472255215630E+00):d := -4.92981920905966E-02+I*(1.03310343047217E+00):e := 1.30599483241450E-01+I*(-4.28708370628631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.41861242361985E-01+I*(-3.09758666496407E-01):b := -1.79385776097980E-02+I*(1.15057644215388E+00):c := -4.57433815018409E-01+I*(-1.60766517506122E+00):d := -6.92091216971097E-02+I*(1.10808154396739E+00):e := 1.83118321251747E-01+I*(-5.36150558806876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89143101130423E-01+I*(-1.61783992947839E-01):b := -3.68696203130353E-01+I*(1.19373212412010E+00):c := -2.19432608525335E-01+I*(-1.42485384475628E+00):d := -1.32656781031912E-01+I*(1.15271961231754E+00):e := 3.59203322058748E-01+I*(-5.61840345204476E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.00433486660199E-01+I*(-2.10872906480273E-01):b := -6.65132070697438E-01+I*(1.00132863879164E+00):c := -1.54621964866028E-01+I*(-1.13182801441281E+00):d := -2.09953305150059E-01+I*(1.14613098724472E+00):e := 4.49280877580996E-01+I*(-3.96571649691749E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10822836211883E-01+I*(-4.34056158889381E-01):b := -7.68540543358720E-01+I*(6.63393715280255E-01):c := -2.93327504498747E-01+I*(-8.65697726667850E-01):d := -2.64930791361496E-01+I*(1.09139855964490E+00):e := 3.78555995718849E-01+I*(-2.83379552914337E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09032080417894E-01+I*(-7.26903825967380E-01):b := -6.30535647498827E-01+I*(3.38050860025238E-01):c := -5.70647363888983E-01+I*(-7.50988300865968E-01):d := -2.71864662861191E-01+I*(1.01413224067523E+00):e := 2.95421039775081E-01+I*(-2.57021112541411E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.95899133816273E-01+I*(-9.52389229649189E-01):b := -3.15691407644176E-01+I*(1.77531610783490E-01):c := -8.56820498761117E-01+I*(-8.41373552193125E-01):d := -2.27510484113040E-01+I*(9.50485799701090E-01):e := 2.31094523587931E-01+I*(-2.68321139602667E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.83986825325952E-01+I*(-1.00500524356097E+00):b := 2.86730572732781E-02+I*(2.56944708247965E-01):c := -1.01794331884835E+00+I*(-1.09456121703317E+00):d := -1.52622068295089E-01+I*(9.30240113805684E-01):e := 1.81673780202858E-01+I*(-2.99478604945346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07049262331721E+00+I*(-6.44955421641553E-01):b := 2.20527010533562E-01+I*(2.12511082680683E-01):c := -4.44765693441711E-01+I*(-1.49502938043578E+00):d := -5.99168279503629E-01+I*(8.19920111246250E-01):e := -9.40127071510571E-02+I*(-3.80664218799998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.17233518438906E+00+I*(-3.70381104427310E-01):b := 2.02118638245996E-01+I*(5.65433817250884E-01):c := -2.23403202228887E-01+I*(-1.69766995945210E+00):d := -5.66225934133633E-01+I*(8.90155177293216E-01):e := -1.71585673153489E-01+I*(-3.83762556013255E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07385814332770E+00+I*(-9.45818381064238E-02):b := -3.88373540101766E-02+I*(8.23955643297797E-01):c := 7.64251574910693E-02+I*(-1.71061258235702E+00):d := -5.86136863740146E-01+I*(9.65133290788435E-01):e := -2.61414952551037E-01+I*(-4.24799537778512E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.21140002096136E-01+I*(5.33928354421448E-02):b := -3.89594979530731E-01+I*(8.67111325264013E-01):c := 3.14426363984143E-01+I*(-1.52780125205208E+00):d := -6.49584523074948E-01+I*(1.00977135913859E+00):e := -3.45678410125019E-01+I*(-5.52680887462268E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.32430387625911E-01+I*(4.30392190971036E-03):b := -6.86030847097816E-01+I*(6.74707839935558E-01):c := 3.79237007643451E-01+I*(-1.23477542170861E+00):d := -7.26881047193096E-01+I*(1.00318273406576E+00):e := -2.57082175141251E-01+I*(-7.92728929210018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.42819737177595E-01+I*(-2.18879330499397E-01):b := -7.89439319759099E-01+I*(3.36772916424170E-01):c := 2.40531468010732E-01+I*(-9.68645133963650E-01):d := -7.81858533404533E-01+I*(9.48450306465946E-01):e := 4.20249657613551E-02+I*(-7.64300058434599E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41028981383607E-01+I*(-5.11726997577397E-01):b := -6.51434423899205E-01+I*(1.14300611691526E-02):c := -3.67883913795042E-02+I*(-8.53935708161768E-01):d := -7.88792404904228E-01+I*(8.71183987496272E-01):e := 1.00842133141627E-01+I*(-5.65669730304620E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.27896034781985E-01+I*(-7.37212401259206E-01):b := -3.36590184044554E-01+I*(-1.49089188072595E-01):c := -3.22961526251638E-01+I*(-9.44320959488925E-01):d := -7.44438226156076E-01+I*(8.07537546522132E-01):e := 4.62907407921887E-02+I*(-4.54666887528890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.15983726291664E-01+I*(-7.89828415170984E-01):b := 7.77428087290007E-03+I*(-6.96760906081198E-02):c := -4.84084346338873E-01+I*(-1.19750862432897E+00):d := -6.69549810338126E-01+I*(7.87291860626726E-01):e := -2.28063251348711E-02+I*(-4.02254472513926E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08794235337773E+00+I*(-3.83493495682972E-01):b := 3.36610606571777E-01+I*(1.98026506531517E-01):c := -2.62282283769763E-01+I*(-1.59180160656875E+00):d := -7.87029147133315E-01+I*(5.77328781020792E-01):e := -2.12537443646176E-01+I*(-3.79995275727563E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.18978491444958E+00+I*(-1.08919178468729E-01):b := 3.18202234284211E-01+I*(5.50949241101719E-01):c := -4.09197925569372E-02+I*(-1.79444218558507E+00):d := -7.54086801763319E-01+I*(6.47563847067757E-01):e := -2.91293763651143E-01+I*(-3.34487946048251E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09130787338821E+00+I*(1.66880087852157E-01):b := 7.72462420280376E-02+I*(8.09471067148632E-01):c := 2.58908567163018E-01+I*(-1.80738480848998E+00):d := -7.73997731369832E-01+I*(7.22541960562978E-01):e := -3.93785648377292E-01+I*(-3.11918891341870E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.38589732156652E-01+I*(3.14854761400725E-01):b := -2.73511383492517E-01+I*(8.52626749114847E-01):c := 4.96909773656092E-01+I*(-1.62457347818505E+00):d := -8.37445390704633E-01+I*(7.67180028913127E-01):e := -5.42678937977799E-01+I*(-3.40069275744856E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.49880117686427E-01+I*(2.65765847868291E-01):b := -5.69947251059602E-01+I*(6.60223263786392E-01):c := 5.61720417315400E-01+I*(-1.33154764784158E+00):d := -9.14741914822781E-01+I*(7.60591403840302E-01):e := -7.19416329642027E-01+I*(-5.47823096035840E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.60269467238112E-01+I*(4.25825954591834E-02):b := -6.73355723720884E-01+I*(3.22288340275004E-01):c := 4.23014877682680E-01+I*(-1.06541736009662E+00):d := -9.69719401034218E-01+I*(7.05858976240488E-01):e := -4.94471003472665E-01+I*(-9.40509802506246E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.58478711444123E-01+I*(-2.50265071618816E-01):b := -5.35350827860991E-01+I*(-3.05451498001340E-03):c := 1.45695018292444E-01+I*(-9.50707934294737E-01):d := -9.76653272533914E-01+I*(6.28592657270814E-01):e := -1.28927155977208E-01+I*(-7.84000359881461E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.45345764842502E-01+I*(-4.75750475300625E-01):b := -2.20506588006340E-01+I*(-1.63573764221761E-01):c := -1.40478116579690E-01+I*(-1.04109318562189E+00):d := -9.32299093785762E-01+I*(5.64946216296674E-01):e := -9.62911509881431E-02+I*(-5.70106645393054E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.33433456352181E-01+I*(-5.28366489212404E-01):b := 1.23857876911114E-01+I*(-8.41606667572856E-02):c := -3.01600936666925E-01+I*(-1.29428085046194E+00):d := -8.57410677967812E-01+I*(5.44700530401268E-01):e := -1.46135092497220E-01+I*(-4.51009418244519E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.33245135713561E-01+I*(-1.71985569939942E-01):b := 4.34846306334364E-01+I*(2.61547774682736E-01):c := -6.02878939091073E-02+I*(-1.54863535793568E+00):d := -7.75004219574246E-01+I*(2.70738402495414E-01):e := -3.78637145500210E-01+I*(-4.12225517477351E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03508769678541E+00+I*(1.02588747274301E-01):b := 4.16437934046798E-01+I*(6.14470509252938E-01):c := 1.61074597303718E-01+I*(-1.75127593695200E+00):d := -7.42061874204250E-01+I*(3.40973468542380E-01):e := -4.50356649087268E-01+I*(-2.90496700746062E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.36610655724043E-01+I*(3.78388013595187E-01):b := 1.75481941790625E-01+I*(8.72992335299851E-01):c := 4.60902957023674E-01+I*(-1.76421855985692E+00):d := -7.61972803810763E-01+I*(4.15951582037600E-01):e := -5.46582190856101E-01+I*(-1.81524034304145E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.83892514492483E-01+I*(5.26362687143756E-01):b := -1.75275683729929E-01+I*(9.16148017266066E-01):c := 6.98904163516747E-01+I*(-1.58140722955199E+00):d := -8.25420463145564E-01+I*(4.60589650387750E-01):e := -7.02001096317168E-01+I*(-6.98664878829584E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95182900022258E-01+I*(4.77273773611321E-01):b := -4.71711551297015E-01+I*(7.23744531937612E-01):c := 7.63714807176055E-01+I*(-1.28838139920851E+00):d := -9.02716987263712E-01+I*(4.54001025314925E-01):e := -1.03348690560431E+00+I*(2.00618882369243E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.05572249573942E-01+I*(2.54090521202214E-01):b := -5.75120023958297E-01+I*(3.85809608426223E-01):c := 6.25009267543336E-01+I*(-1.02225111146355E+00):d := -9.57694473475149E-01+I*(3.99268597715110E-01):e := -1.77006235313969E+00+I*(-4.86011556941812E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.03781493779953E-01+I*(-3.87571458757858E-02):b := -4.37115128098404E-01+I*(6.04667531712060E-02):c := 3.47689408153100E-01+I*(-9.07541685661670E-01):d := -9.64628344974845E-01+I*(3.22002278745436E-01):e := -7.45773270043326E-01+I*(-1.41460060508347E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.90648547178331E-01+I*(-2.64242549557595E-01):b := -1.22270888243753E-01+I*(-1.00052496070542E-01):c := 6.15162732809662E-02+I*(-9.97926936988827E-01):d := -9.20274166226693E-01+I*(2.58355837771297E-01):e := -3.19650445578144E-01+I*(-8.65577875512400E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.78736238688011E-01+I*(-3.16858563469373E-01):b := 2.22093576673702E-01+I*(-2.06393986060663E-02):c := -9.96065468062692E-02+I*(-1.25111460182887E+00):d := -8.45385750408743E-01+I*(2.38110151875890E-01):e := -3.23398787889003E-01+I*(-5.77824657832387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.78785517737836E-01+I*(-1.09398553516382E-01):b := 4.69268534134218E-01+I*(3.73352579806126E-01):c := 6.67020562068726E-02+I*(-1.38572860201141E+00):d := -5.68720094073494E-01+I*(4.36060211546525E-02):e := -6.77436551640282E-01+I*(-5.95430694868947E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.80628078809682E-01+I*(1.65175763697861E-01):b := 4.50860161846652E-01+I*(7.26275314376328E-01):c := 2.88064547419698E-01+I*(-1.58836918102773E+00):d := -5.35777748703497E-01+I*(1.13841087201618E-01):e := -7.43129609726363E-01+I*(-2.66550213595339E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.82151037748318E-01+I*(4.40975030018747E-01):b := 2.09904169590479E-01+I*(9.84797140423241E-01):c := 5.87892907139654E-01+I*(-1.60131180393264E+00):d := -5.55688678310011E-01+I*(1.88819200696838E-01):e := -7.85495791827905E-01+I*(2.25682193026918E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.29432896516757E-01+I*(5.88949703567316E-01):b := -1.40853455930075E-01+I*(1.02795282238946E+00):c := 8.25894113632727E-01+I*(-1.41850047362771E+00):d := -6.19136337644812E-01+I*(2.33457269046988E-01):e := -8.16483203228626E-01+I*(3.49879894580890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.40723282046532E-01+I*(5.39860790034882E-01):b := -4.37289323497160E-01+I*(8.35549337061002E-01):c := 8.90704757292035E-01+I*(-1.12547464328423E+00):d := -6.96432861762960E-01+I*(2.26868643974163E-01):e := -8.29633557658155E-01+I*(8.45220349520472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.88873684017831E-02+I*(3.16677537625774E-01):b := -5.40697796158442E-01+I*(4.97614413549613E-01):c := 7.51999217659316E-01+I*(-8.59344355539276E-01):d := -7.51410347974397E-01+I*(1.72136216374348E-01):e := -6.93823655737723E-01+I*(2.03895900208388E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.06781241957722E-02+I*(2.38298705477743E-02):b := -4.02692900298549E-01+I*(1.72271558294596E-01):c := 4.74679358269080E-01+I*(-7.44634929737395E-01):d := -7.58344219474092E-01+I*(9.48698974046745E-02):e := 1.04938301439195E+01+I*(3.81959172282509E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.36188929202606E-01+I*(-2.01655533134035E-01):b := -8.78486604438986E-02+I*(1.17523090528485E-02):c := 1.88506223396946E-01+I*(-8.35020181064551E-01):d := -7.13990040725941E-01+I*(3.12234564305345E-02):e := 1.78303432939629E-03+I*(-2.31024037670157E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.24276620712286E-01+I*(-2.54271547045813E-01):b := 2.56515804473556E-01+I*(9.11654065173239E-02):c := 2.73834033097105E-02+I*(-1.08820784590459E+00):d := -6.39101624907990E-01+I*(1.09777705351285E-02):e := -5.40233552663331E-01+I*(-1.09606972463112E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.43627982705041E-01+I*(-2.25017606974084E-01):b := 4.23770747023339E-01+I*(4.81126211012453E-01):c := 5.92675575828219E-02+I*(-1.17930722039981E+00):d := -2.64699405545544E-01+I*(2.20940252308782E-03):e := -5.54867377279189E-01+I*(-1.72116286515482E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.45470543776888E-01+I*(4.95567102401590E-02):b := 4.05362374735773E-01+I*(8.34048945582655E-01):c := 2.80630048795647E-01+I*(-1.38194779941613E+00):d := -2.31757060175549E-01+I*(7.24444685700531E-02):e := -1.60701292062934E+00+I*(-6.74143703107480E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46993502715524E-01+I*(3.25355976561045E-01):b := 1.64406382479600E-01+I*(1.09257077162957E+00):c := 5.80458408515603E-01+I*(-1.39489042232105E+00):d := -2.51667989782062E-01+I*(1.47422582065273E-01):e := -1.41790641410666E+00+I*(5.64021843653293E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.94275361483963E-01+I*(4.73330650109614E-01):b := -1.86351243040955E-01+I*(1.13572645359578E+00):c := 8.18459615008676E-01+I*(-1.21207909201612E+00):d := -3.15115649116863E-01+I*(1.92060650415423E-01):e := -6.64321580188879E-01+I*(1.16027265900732E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.44342529862625E-02+I*(4.24241736577180E-01):b := -4.82787110608040E-01+I*(9.43322968267329E-01):c := 8.83270258667985E-01+I*(-9.19053261672639E-01):d := -3.92412173235011E-01+I*(1.85472025342598E-01):e := 1.08837124236106E-01+I*(1.22760461620611E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.84044903434578E-01+I*(2.01058484168072E-01):b := -5.86195583269322E-01+I*(6.05388044755941E-01):c := 7.44564719035265E-01+I*(-6.52922973927682E-01):d := -4.47389659446448E-01+I*(1.30739597742783E-01):e := 7.55171945829949E-01+I*(9.48800875830594E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.85835659228567E-01+I*(-9.17891829099277E-02):b := -4.48190687409429E-01+I*(2.80045189500923E-01):c := 4.67244859645029E-01+I*(-5.38213548125800E-01):d := -4.54323530946143E-01+I*(5.34732787731095E-02):e := 1.21656835712000E+00+I*(3.84701155763245E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.89686058301887E-02+I*(-3.17274586591737E-01):b := -1.33346447554778E-01+I*(1.19525940259176E-01):c := 1.81071724772896E-01+I*(-6.28598799452957E-01):d := -4.09969352197991E-01+I*(-1.01731622010304E-02):e := 1.34908106423099E+00+I*(-4.61964960485812E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.89119085679491E-01+I*(-3.69890600503515E-01):b := 2.11018017362676E-01+I*(1.98939037723651E-01):c := 1.99489046856599E-02+I*(-8.81786464293000E-01):d := -3.35080936380041E-01+I*(-3.04188480964362E-02):e := 8.14478130513898E-01+I*(-1.42814840980275E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.37805354741909E-01+I*(-4.64743290237542E-01):b := 3.19641865242486E-01+I*(5.34440188489785E-01):c := -7.91127052498174E-02+I*(-1.02595807167508E+00):d := -5.19681296621463E-03+I*(1.65918484530598E-01):e := 5.51337465041904E-01+I*(-9.31566374195200E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.39647915813755E-01+I*(-1.90168973023298E-01):b := 3.01233492954920E-01+I*(8.87362923059987E-01):c := 1.42249785963008E-01+I*(-1.22859865069140E+00):d := 2.77455324037815E-02+I*(2.36153550577563E-01):e := 4.38696202625386E-01+I*(-1.93876187302364E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41170874752391E-01+I*(8.56302932975878E-02):b := 6.02775006987472E-02+I*(1.14588474910690E+00):c := 4.42078145682963E-01+I*(-1.24154127359631E+00):d := 7.83460279726817E-03+I*(3.11131664072784E-01):e := 1.86286274672695E+01+I*(-1.57740789782348E+01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.84527335208302E-02+I*(2.33604966846157E-01):b := -2.90480124821808E-01+I*(1.18904043107312E+00):c := 6.80079352176037E-01+I*(-1.05872994329138E+00):d := -5.56130565375333E-02+I*(3.55769732422934E-01):e := 1.23858540118621E+00+I*(1.75446980936388E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.00256880949395E-01+I*(1.84516053313722E-01):b := -5.86915992388893E-01+I*(9.96636945744661E-01):c := 7.44889995835345E-01+I*(-7.65704112947907E-01):d := -1.32909580655681E-01+I*(3.49181107350108E-01):e := 8.92219803832334E-01+I*(6.76276614285462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.89867531397710E-01+I*(-3.86671990953854E-02):b := -6.90324465050175E-01+I*(6.58702022233273E-01):c := 6.06184456202626E-01+I*(-4.99573825202949E-01):d := -1.87887066867118E-01+I*(2.94448679750294E-01):e := 7.83325762106138E-01+I*(2.55646223323854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.91658287191699E-01+I*(-3.31514866173385E-01):b := -5.52319569190282E-01+I*(3.33359166978255E-01):c := 3.28864596812390E-01+I*(-3.84864399401067E-01):d := -1.94820938366813E-01+I*(2.17182360780620E-01):e := 7.20358519990242E-01+I*(-1.68181419007762E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.04791233793321E-01+I*(-5.57000269855194E-01):b := -2.37475329335631E-01+I*(1.72839917736507E-01):c := 4.26914619402559E-02+I*(-4.75249650728224E-01):d := -1.50466759618662E-01+I*(1.53535919806480E-01):e := 6.70128610499534E-01+I*(-2.54903975032861E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.32964577163585E-02+I*(-6.09616283766973E-01):b := 1.06889135581823E-01+I*(2.52253015200983E-01):c := -1.18431358146979E-01+I*(-7.28437315568267E-01):d := -7.55783438007113E-02+I*(1.33290233911074E-01):e := 6.18710483822770E-01+I*(-5.23782490806590E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.10833217559894E-01+I*(-7.16405291853583E-01):b := 2.05604949840534E-01+I*(5.08348309657618E-01):c := -2.83689069386341E-01+I*(-9.97434926811461E-01):d := 8.83635365465638E-02+I*(4.58131968282088E-01):e := 3.01310186155717E-01+I*(-5.39895036997704E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.12675778631741E-01+I*(-4.41830974639339E-01):b := 1.87196577552968E-01+I*(8.61271044227821E-01):c := -6.23265781735150E-02+I*(-1.20007550582778E+00):d := 1.21305881916560E-01+I*(5.28367034329053E-01):e := 3.03742925664385E-01+I*(-7.85000188331315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.14198737570377E-01+I*(-1.66031708318453E-01):b := -5.37594147032039E-02+I*(1.11979287027473E+00):c := 2.37501781546440E-01+I*(-1.21301812873270E+00):d := 1.01394952310047E-01+I*(6.03345147824273E-01):e := 6.50736008312061E-01+I*(-1.20055678997640E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61480596338816E-01+I*(-1.80570347698847E-02):b := -4.04517040223759E-01+I*(1.16294855224095E+00):c := 4.75502988039514E-01+I*(-1.03020679842776E+00):d := 3.79472929752452E-02+I*(6.47983216174423E-01):e := 1.46628197452569E+00+I*(-5.92616871584882E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.27229018131409E-01+I*(-6.71459483023192E-02):b := -7.00952907790844E-01+I*(9.70545066912494E-01):c := 5.40313631698822E-01+I*(-7.37180968084287E-01):d := -3.93492311429026E-02+I*(6.41394591101598E-01):e := 9.65804342725710E-01+I*(-7.29626617173725E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.16839668579725E-01+I*(-2.90329200711427E-01):b := -8.04361380452126E-01+I*(6.32610143401106E-01):c := 4.01608092066102E-01+I*(-4.71050680339330E-01):d := -9.43267173543394E-02+I*(5.86662163501784E-01):e := 6.61889875422591E-01+I*(-1.08318694928708E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.18630424373714E-01+I*(-5.83176867789427E-01):b := -6.66356484592234E-01+I*(3.07267288146089E-01):c := 1.24288232675866E-01+I*(-3.56341254537448E-01):d := -1.01260588854035E-01+I*(5.09395844532110E-01):e := 5.12110473813809E-01+I*(-1.95133196826212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.31763370975335E-01+I*(-8.08662271471236E-01):b := -3.51512244737582E-01+I*(1.46748038904341E-01):c := -1.61884902196267E-01+I*(-4.46726505864605E-01):d := -5.69064101058833E-02+I*(4.45749403557970E-01):e := 4.19172786015432E-01+I*(-2.87804639868469E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.56324320534344E-01+I*(-8.61278285383014E-01):b := -7.14777982012804E-03+I*(2.26161136368816E-01):c := -3.23007722283503E-01+I*(-6.99914170704647E-01):d := 1.79820057120671E-02+I*(4.25503717662564E-01):e := 3.51138248581120E-01+I*(-3.94411346418028E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.28541022532172E-01+I*(-8.62248164354462E-01):b := 1.35019140913199E-01+I*(4.15059254600457E-01):c := -4.58737980434239E-01+I*(-1.10708408229009E+00):d := -2.77962843516987E-02+I*(7.42119917139111E-01):e := 1.33111147784771E-01+I*(-4.38159956820891E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.30383583604019E-01+I*(-5.87673847140219E-01):b := 1.16610768625633E-01+I*(7.67981989170659E-01):c := -2.37375489221413E-01+I*(-1.30972466130641E+00):d := 5.14606101829710E-03+I*(8.12354983186076E-01):e := 8.43795126899440E-02+I*(-5.47177837018416E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.31906542542655E-01+I*(-3.11874580819333E-01):b := -1.24345223630540E-01+I*(1.02650381521757E+00):c := 6.24528704985415E-02+I*(-1.32266728421132E+00):d := -1.47648685882158E-02+I*(8.87333096681297E-01):e := 1.09653503620403E-01+I*(-7.40822184697962E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.79188401311094E-01+I*(-1.63899907270764E-01):b := -4.75102849151095E-01+I*(1.06965949718379E+00):c := 3.00454076991616E-01+I*(-1.13985595390639E+00):d := -7.82125279230180E-02+I*(9.31971165031447E-01):e := 4.23150188562443E-01+I*(-8.93678417903516E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.04787868408695E-02+I*(-2.12988820803198E-01):b := -7.71538716718179E-01+I*(8.77256011855333E-01):c := 3.65264720650923E-01+I*(-8.46830123562913E-01):d := -1.55509052041165E-01+I*(9.25382539958621E-01):e := 6.55075069321900E-01+I*(-5.64450239480773E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.91318636074461E-02+I*(-4.36172073212306E-01):b := -8.74947189379462E-01+I*(5.39321088343945E-01):c := 2.26559181018204E-01+I*(-5.80699835817955E-01):d := -2.10486538252603E-01+I*(8.70650112358807E-01):e := 5.10919010826451E-01+I*(-3.55831492047568E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00922619401435E-01+I*(-7.29019740290305E-01):b := -7.36942293519568E-01+I*(2.13978233088927E-01):c := -5.07606783720313E-02+I*(-4.65990410016073E-01):d := -2.17420409752298E-01+I*(7.93383793389133E-01):e := 3.72266437815197E-01+I*(-3.18319803151464E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.59444339969432E-02+I*(-9.54505143972115E-01):b := -4.22098053664918E-01+I*(5.34589838471798E-02):c := -3.36933813244165E-01+I*(-5.56375661343230E-01):d := -1.73066231004146E-01+I*(7.29737352414993E-01):e := 2.73863546066879E-01+I*(-3.34020030011072E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.74032125506622E-01+I*(-1.00712115788389E+00):b := -7.77335887474633E-02+I*(1.32872081311655E-01):c := -4.98056633331401E-01+I*(-8.09563326183273E-01):d := -9.81778151861955E-02+I*(7.09491666519587E-01):e := 1.97561461832480E-01+I*(-3.73678723110207E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.89060868159475E-01+I*(-8.34030406834035E-01):b := 1.40912322931465E-01+I*(2.98224008971906E-01):c := -5.22352107462255E-01+I*(-1.30359947964789E+00):d := -2.99323804490098E-01+I*(8.85001213656978E-01):e := 1.30036293181666E-02+I*(-3.98061003220597E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.90903429231321E-01+I*(-5.59456089619792E-01):b := 1.22503950643899E-01+I*(6.51146743542108E-01):c := -3.00989616249430E-01+I*(-1.50624005866421E+00):d := -2.66381459120102E-01+I*(9.55236279703943E-01):e := -5.61769511849964E-02+I*(-4.46409350907074E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.92426388169957E-01+I*(-2.83656823298905E-01):b := -1.18452041612274E-01+I*(9.09668569589021E-01):c := -1.16125652947383E-03+I*(-1.51918268156912E+00):d := -2.86292388726616E-01+I*(1.03021439319916E+00):e := -1.13107473609680E-01+I*(-5.51178993859420E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.39708246938396E-01+I*(-1.35682149750337E-01):b := -4.69209667132828E-01+I*(9.52824251555236E-01):c := 2.36839949963599E-01+I*(-1.33637135126419E+00):d := -3.49740048061417E-01+I*(1.07485246154931E+00):e := -6.68736828278026E-02+I*(-7.43547799114338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.50998632468171E-01+I*(-1.84771063282771E-01):b := -7.65645534699913E-01+I*(7.60420766226782E-01):c := 3.01650593622907E-01+I*(-1.04334552092071E+00):d := -4.27036572179565E-01+I*(1.06826383647649E+00):e := 2.17708075873325E-01+I*(-7.91191814304566E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61387982019856E-01+I*(-4.07954315691879E-01):b := -8.69054007361196E-01+I*(4.22485842715394E-01):c := 1.62945053990188E-01+I*(-7.77215233175755E-01):d := -4.82014058391002E-01+I*(1.01353140887667E+00):e := 3.22091973029968E-01+I*(-5.63192216161209E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59597226225867E-01+I*(-7.00801982769878E-01):b := -7.31049111501303E-01+I*(9.71429874603760E-02):c := -1.14374805400048E-01+I*(-6.62505807373873E-01):d := -4.88947929890697E-01+I*(9.36265089907000E-01):e := 2.46676811567208E-01+I*(-4.31388764665949E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46464279624246E-01+I*(-9.26287386451687E-01):b := -4.16204871646651E-01+I*(-6.33762617813714E-02):c := -4.00547940272182E-01+I*(-7.52891058701030E-01):d := -4.44593751142546E-01+I*(8.72618648932860E-01):e := 1.59893285897860E-01+I*(-3.86214924642998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.34551971133925E-01+I*(-9.78903400363466E-01):b := -7.18404067291973E-02+I*(1.60368356831039E-02):c := -5.61670760359418E-01+I*(-1.00607872354107E+00):d := -3.69705335324595E-01+I*(8.52372963037454E-01):e := 8.36105462137522E-02+I*(-3.79750935295244E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09244983088158E+00+I*(-5.92457600497586E-01):b := 2.98381825536463E-01+I*(-3.66438636687104E-02):c := -1.52116085954472E-01+I*(-1.13396151074619E+00):d := -7.15411670190284E-01+I*(6.20731978781900E-01):e := -2.43789865215540E-01+I*(-3.44711267402732E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19429239195343E+00+I*(-3.17883283283342E-01):b := 2.79973453248897E-01+I*(3.16278870901492E-01):c := 6.92464052583538E-02+I*(-1.33660208976251E+00):d := -6.82469324820288E-01+I*(6.90967044828865E-01):e := -3.06335237948576E-01+I*(-2.89013694839811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09581535089206E+00+I*(-4.20840169624561E-02):b := 3.90174609927239E-02+I*(5.74800696948405E-01):c := 3.69074764978309E-01+I*(-1.34954471266742E+00):d := -7.02380254426801E-01+I*(7.65945158324086E-01):e := -3.90881383310442E-01+I*(-2.52078946039644E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.43097209660500E-01+I*(1.05890656586112E-01):b := -3.11740164527831E-01+I*(6.17956378914620E-01):c := 6.07075971471383E-01+I*(-1.16673338236249E+00):d := -7.65827913761603E-01+I*(8.10583226674235E-01):e := -5.16527705379341E-01+I*(-2.49570866885446E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54387595190275E-01+I*(5.68017430536778E-02):b := -6.08176032094915E-01+I*(4.25552893586165E-01):c := 6.71886615130690E-01+I*(-8.73707552019013E-01):d := -8.43124437879750E-01+I*(8.03994601601410E-01):e := -6.92000021435084E-01+I*(-3.68163748550187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64776944741960E-01+I*(-1.66381509355430E-01):b := -7.11584504756198E-01+I*(8.76179700747771E-02):c := 5.33181075497971E-01+I*(-6.07577264274055E-01):d := -8.98101924091187E-01+I*(7.49262174001596E-01):e := -6.52175641047832E-01+I*(-7.26350358776468E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.62986188947970E-01+I*(-4.59229176433429E-01):b := -5.73579608896304E-01+I*(-2.37724885180240E-01):c := 2.55861216107735E-01+I*(-4.92867838472174E-01):d := -9.05035795590883E-01+I*(6.71995855031922E-01):e := -2.86195957713288E-01+I*(-7.43721531545551E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.49853242346349E-01+I*(-6.84714580115238E-01):b := -2.58735369041654E-01+I*(-3.98244134421988E-01):c := -3.03119187643987E-02+I*(-5.83253089799330E-01):d := -8.60681616842731E-01+I*(6.08349414057782E-01):e := -1.80709930431283E-01+I*(-5.52666130025240E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.37940933856029E-01+I*(-7.37330594027017E-01):b := 8.56290958758005E-02+I*(-3.18831036957513E-01):c := -1.91434738851634E-01+I*(-8.36440754639373E-01):d := -7.85793201024781E-01+I*(5.88103728162376E-01):e := -1.97001899679117E-01+I*(-4.25331553778125E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10989956094209E+00+I*(-3.30995674539006E-01):b := 4.14465421574677E-01+I*(-5.11284398178762E-02):c := 3.03673237174758E-02+I*(-1.23073373687916E+00):d := -9.03272537819969E-01+I*(3.78140648556442E-01):e := -3.31524319295080E-01+I*(-2.58242486589120E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.21174212201394E+00+I*(-5.64213573247626E-02):b := 3.96057049287111E-01+I*(3.01794294752326E-01):c := 2.51729814930302E-01+I*(-1.43337431589548E+00):d := -8.70330192449973E-01+I*(4.48375714603407E-01):e := -3.52575042889671E-01+I*(-1.82531534516652E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.11326508095258E+00+I*(2.19377908996124E-01):b := 1.55101057030938E-01+I*(5.60316120799239E-01):c := 5.51558174650257E-01+I*(-1.44631693880039E+00):d := -8.90241122056487E-01+I*(5.23353828098628E-01):e := -3.96145490508517E-01+I*(-1.18645383143006E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.60546939721016E-01+I*(3.67352582544692E-01):b := -1.95656568489616E-01+I*(6.03471802765454E-01):c := 7.89559381143330E-01+I*(-1.26350560849546E+00):d := -9.53688781391288E-01+I*(5.67991896448778E-01):e := -4.71953959405605E-01+I*(-6.51289736394751E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.71837325250791E-01+I*(3.18263669012258E-01):b := -4.92092436056701E-01+I*(4.11068317437000E-01):c := 8.54370024802639E-01+I*(-9.70479778151981E-01):d := -1.03098530550944E+00+I*(5.61403271375952E-01):e := -6.07555519459517E-01+I*(-4.74528397789040E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.82226674802476E-01+I*(9.50804166031504E-02):b := -5.95500908717983E-01+I*(7.31333939256108E-02):c := 7.15664485169919E-01+I*(-7.04349490407024E-01):d := -1.08596279172087E+00+I*(5.06670843776138E-01):e := -7.90581606432761E-01+I*(-1.92533711503618E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.80435919008487E-01+I*(-1.97767250474849E-01):b := -4.57496012858090E-01+I*(-2.52209461329406E-01):c := 4.38344625779683E-01+I*(-5.89640064605142E-01):d := -1.09289666322057E+00+I*(4.29404524806464E-01):e := -6.80191606236552E-01+I*(-4.95590985397170E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.67302972406865E-01+I*(-4.23252654156658E-01):b := -1.42651773003439E-01+I*(-4.12728710571154E-01):c := 1.52171490907549E-01+I*(-6.80025315932299E-01):d := -1.04854248447242E+00+I*(3.65758083832324E-01):e := -4.27355021390709E-01+I*(-4.76073676179396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.55390663916545E-01+I*(-4.75868668068437E-01):b := 2.01712691914015E-01+I*(-3.33315613106678E-01):c := -8.95132917968609E-03+I*(-9.33212980772342E-01):d := -9.73654068654466E-01+I*(3.45512397936918E-01):e := -3.41162499407764E-01+I*(-3.55253992207184E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.55202343277925E-01+I*(-1.19487748795975E-01):b := 5.12701121337264E-01+I*(1.23928283333433E-02):c := 2.32361713578132E-01+I*(-1.18756748824609E+00):d := -8.91247610260900E-01+I*(7.15502700310638E-02):e := -4.40671535099244E-01+I*(-1.73507973412256E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05704490434977E+00+I*(1.55086568418269E-01):b := 4.94292749049698E-01+I*(3.65315562903545E-01):c := 4.53724204790958E-01+I*(-1.39020806726241E+00):d := -8.58305264890904E-01+I*(1.41785336078029E-01):e := -4.13410394827397E-01+I*(-8.34660745222306E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.58567863288406E-01+I*(4.30885834739155E-01):b := 2.53336756793525E-01+I*(6.23837388950458E-01):c := 7.53552564510913E-01+I*(-1.40315069016732E+00):d := -8.78216194497417E-01+I*(2.16763449573249E-01):e := -4.15983852186672E-01+I*(-8.72800077505083E-04):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.05849722056846E-01+I*(5.78860508287723E-01):b := -9.74208687270291E-02+I*(6.66993070916673E-01):c := 9.91553771003987E-01+I*(-1.22033935986239E+00):d := -9.41663853832219E-01+I*(2.61401517923399E-01):e := -4.46195117929093E-01+I*(8.27503714470298E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.17140107586621E-01+I*(5.29771594755289E-01):b := -3.93856736294114E-01+I*(4.74589585588219E-01):c := 1.05636441466329E+00+I*(-9.27313529518914E-01):d := -1.01896037795037E+00+I*(2.54812892850574E-01):e := -5.24668570233306E-01+I*(1.70788109990947E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.27529457138305E-01+I*(3.06588342346181E-01):b := -4.97265208955396E-01+I*(1.36654662076830E-01):c := 9.17658875030576E-01+I*(-6.61183241773956E-01):d := -1.07393786416180E+00+I*(2.00080465250759E-01):e := -7.11716022656501E-01+I*(2.21022693518021E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.25738701344316E-01+I*(1.37406752681817E-02):b := -3.59260313095503E-01+I*(-1.88688193178187E-01):c := 6.40339015640340E-01+I*(-5.46473815972075E-01):d := -1.08087173566150E+00+I*(1.22814146281086E-01):e := -9.54320214790827E-01+I*(-9.98532941124429E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.12605754742695E-01+I*(-2.11744728413627E-01):b := -4.44160732408521E-02+I*(-3.49207442419934E-01):c := 3.54165880768206E-01+I*(-6.36859067299232E-01):d := -1.03651755691335E+00+I*(5.91677053069456E-02):e := -7.51602291382912E-01+I*(-3.15134430573176E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.00693446252374E-01+I*(-2.64360742325406E-01):b := 2.99948391676602E-01+I*(-2.69794344955459E-01):c := 1.93043060680970E-01+I*(-8.90046732139275E-01):d := -9.61629141095397E-01+I*(3.89220194115397E-02):e := -5.27303271498810E-01+I*(-2.73810526055252E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.00742725302200E-01+I*(-5.69007323724144E-02):b := 5.47123349137119E-01+I*(1.24197633456734E-01):c := 3.59351663694113E-01+I*(-1.02466073232181E+00):d := -6.84963484760148E-01+I*(-1.55582111309698E-01):e := -6.20511229784501E-01+I*(-7.41102024107748E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.02585286374046E-01+I*(2.17673584841829E-01):b := 5.28714976849553E-01+I*(4.77120368026936E-01):c := 5.80714154906938E-01+I*(-1.22730131133813E+00):d := -6.52021139390152E-01+I*(-8.53470452627330E-02):e := -5.11475820699548E-01+I*(3.00719923754806E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.04108245312682E-01+I*(4.93472851162715E-01):b := 2.87758984593380E-01+I*(7.35642194073848E-01):c := 8.80542514626893E-01+I*(-1.24024393424305E+00):d := -6.71932068996665E-01+I*(-1.03689317675127E-02):e := -4.55932655768624E-01+I*(1.30104393350341E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.51390104081121E-01+I*(6.41447524711283E-01):b := -6.29986409271748E-02+I*(7.78797876040064E-01):c := 1.11854372111997E+00+I*(-1.05743260393812E+00):d := -7.35379728331467E-01+I*(3.42691365826374E-02):e := -4.28574566230866E-01+I*(2.35868167674876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.62680489610896E-01+I*(5.92358611178849E-01):b := -3.59434508494260E-01+I*(5.86394390711609E-01):c := 1.18335436477927E+00+I*(-7.64406773594639E-01):d := -8.12676252449615E-01+I*(2.76805115098121E-02):e := -4.31020765569178E-01+I*(3.66153669428712E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69301608374196E-02+I*(3.69175358769742E-01):b := -4.62842981155542E-01+I*(2.48459467200221E-01):c := 1.04464882514656E+00+I*(-4.98276485849681E-01):d := -8.67653738661052E-01+I*(-2.70519160900023E-02):e := -5.07640911185921E-01+I*(5.50272365436646E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.87209166314086E-02+I*(7.63276916917417E-02):b := -3.24838085295649E-01+I*(-7.68833880547964E-02):c := 7.67328965756319E-01+I*(-3.83567060047800E-01):d := -8.74587610160747E-01+I*(-1.04318235059676E-01):e := -8.61851142412760E-01+I*(7.34692257226139E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.58146136766970E-01+I*(-1.49157711990067E-01):b := -9.99384544099801E-03+I*(-2.37402637296544E-01):c := 4.81155830884186E-01+I*(-4.73952311374956E-01):d := -8.30233431412595E-01+I*(-1.67964676033816E-01):e := -1.29599124834489E+00+I*(1.87507540309236E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46233828276649E-01+I*(-2.01773725901846E-01):b := 3.34370619476457E-01+I*(-1.57989539832069E-01):c := 3.20033010796950E-01+I*(-7.27139976214999E-01):d := -7.55345015594645E-01+I*(-1.88210361929222E-01):e := -8.68938230556563E-01+I*(-1.49103284481392E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.65585190269405E-01+I*(-1.72519785830117E-01):b := 5.01625562026239E-01+I*(2.31971264663061E-01):c := 3.51917165070061E-01+I*(-8.18239350710219E-01):d := -3.80942796232199E-01+I*(-1.96978729941263E-01):e := -1.07983661899015E+00+I*(1.85458914657983E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.67427751341251E-01+I*(1.02054531384127E-01):b := 4.83217189738673E-01+I*(5.84893999233263E-01):c := 5.73279656282887E-01+I*(-1.02087992972654E+00):d := -3.48000450862203E-01+I*(-1.26743663894298E-01):e := -7.32569204660870E-01+I*(1.82518898350093E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.68950710279887E-01+I*(3.77853797705013E-01):b := 2.42261197482501E-01+I*(8.43415825280175E-01):c := 8.73108016002842E-01+I*(-1.03382255263145E+00):d := -3.67911380468716E-01+I*(-5.17655503990773E-02):e := -5.50719105280987E-01+I*(3.16471866478878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.16232569048327E-01+I*(5.25828471253581E-01):b := -1.08496428038054E-01+I*(8.86571507246391E-01):c := 1.11110922249592E+00+I*(-8.51011222326521E-01):d := -4.31359039803518E-01+I*(-7.12748204892741E-03):e := -4.19084298431985E-01+I*(4.42691801312441E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.24770454218985E-02+I*(4.76739557721147E-01):b := -4.04932295605139E-01+I*(6.94168021917936E-01):c := 1.17591986615522E+00+I*(-5.57985391983044E-01):d := -5.08655563921665E-01+I*(-1.37161071217528E-02):e := -2.98606732373486E-01+I*(5.89148811820122E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.62087695870214E-01+I*(2.53556305312039E-01):b := -5.08340768266421E-01+I*(3.56233098406548E-01):c := 1.03721432652250E+00+I*(-2.91855104238087E-01):d := -5.63633050133102E-01+I*(-6.84485347215672E-02):e := -1.65151584434363E-01+I*(8.08419983312678E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.63878451664203E-01+I*(-3.92913617659601E-02):b := -3.70335872406528E-01+I*(3.08902431515309E-02):c := 7.59894467132269E-01+I*(-1.77145678436205E-01):d := -5.70566921632798E-01+I*(-1.45714853691241E-01):e := -1.46182151865876E-02+I*(1.28435048973189E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.70113982658249E-02+I*(-2.64776765447769E-01):b := -5.54916325518773E-02+I*(-1.29629006090217E-01):c := 4.73721332260135E-01+I*(-2.67530929763362E-01):d := -5.26212742884646E-01+I*(-2.09361294665381E-01):e := -8.59467541641563E-01+I*(2.92156468133631E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.11076293243855E-01+I*(-3.17392779359548E-01):b := 2.88872832365577E-01+I*(-5.02159086257415E-02):c := 3.12598512172899E-01+I*(-5.20718594603405E-01):d := -4.51324327066696E-01+I*(-2.29606980560787E-01):e := -2.19674508796262E+00+I*(6.68714058274181E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59762562306273E-01+I*(-4.12245469093574E-01):b := 3.97496680245386E-01+I*(2.85285242140393E-01):c := 2.13536902237422E-01+I*(-6.64890201985486E-01):d := -1.21440203652869E-01+I*(-3.32696479337524E-02):e := -1.96327584165952E+00+I*(-1.73764946209593E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.61605123378119E-01+I*(-1.37671151879331E-01):b := 3.79088307957820E-01+I*(6.38207976710594E-01):c := 4.34899393450248E-01+I*(-8.67530781001806E-01):d := -8.84978582828732E-02+I*(3.69654181132127E-02):e := -1.54032653034322E+00+I*(1.23051349354215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.63128082316755E-01+I*(1.38128114441556E-01):b := 1.38132315701648E-01+I*(8.96729802757507E-01):c := 7.34727753170203E-01+I*(-8.80473403906720E-01):d := -1.08408787889387E-01+I*(1.11943531608433E-01):e := -9.15920469046172E-01+I*(6.51670004820912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10409941085194E-01+I*(2.86102787990124E-01):b := -2.12625309818907E-01+I*(9.39885484723723E-01):c := 9.72728959663277E-01+I*(-6.97662073601788E-01):d := -1.71856447224188E-01+I*(1.56581599958583E-01):e := -4.47765128140838E-01+I*(8.47257996420764E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.78299673385031E-01+I*(2.37013874457690E-01):b := -5.09061177385992E-01+I*(7.47481999395268E-01):c := 1.03753960332258E+00+I*(-4.04636243258311E-01):d := -2.49152971342335E-01+I*(1.49992974885757E-01):e := -3.77825910769780E-02+I*(9.22876247292702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67910323833347E-01+I*(1.38306220485820E-02):b := -6.12469650047274E-01+I*(4.09547075883880E-01):c := 8.98834063689865E-01+I*(-1.38505955513354E-01):d := -3.04130457553772E-01+I*(9.52605472859431E-02):e := 3.96744239366458E-01+I*(9.16755088687692E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.69701079627336E-01+I*(-2.79017045029418E-01):b := -4.74464754187381E-01+I*(8.42042206288628E-02):c := 6.21514204299629E-01+I*(-2.37965297114724E-02):d := -3.11064329053468E-01+I*(1.79942283162694E-02):e := 9.58763510782385E-01+I*(7.74236295467218E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.82834026228957E-01+I*(-5.04502448711227E-01):b := -1.59620514332730E-01+I*(-7.63150286128850E-02):c := 3.35341069427495E-01+I*(-1.14181781038629E-01):d := -2.66710150305316E-01+I*(-4.56522126578705E-02):e := 1.81347819193486E+00+I*(1.53454344996661E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05253665280722E-01+I*(-5.57118462623005E-01):b := 1.84743950584724E-01+I*(3.09806885159039E-03):c := 1.74218249340260E-01+I*(-3.67369445878672E-01):d := -1.91821734487366E-01+I*(-6.58978985532763E-02):e := 1.86664292887135E+00+I*(-2.56609560368331E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.32790425124258E-01+I*(-6.63907470709616E-01):b := 2.83459764843435E-01+I*(2.59193363308226E-01):c := 8.96053810089839E-03+I*(-6.36367057121867E-01):d := -2.78798541400906E-02+I*(2.58943835817737E-01):e := 4.23150927521945E-02+I*(-1.14770898141576E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.34632986196104E-01+I*(-3.89333153495372E-01):b := 2.65051392555869E-01+I*(6.12116097878428E-01):c := 2.30323029313724E-01+I*(-8.39007636138186E-01):d := 5.06249122990533E-03+I*(3.29178901864702E-01):e := -7.66184868042797E-01+I*(-1.32406958809850E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.36155945134740E-01+I*(-1.13533887174486E-01):b := 2.40954002996963E-02+I*(8.70637923925341E-01):c := 5.30151389033679E-01+I*(-8.51950259043100E-01):d := -1.48484383766078E-02+I*(4.04157015359923E-01):e := -2.31205779592485E+00+I*(-5.76909457896635E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.83437803903179E-01+I*(3.44407863740823E-02):b := -3.26662225220858E-01+I*(9.13793605891556E-01):c := 7.68152595526753E-01+I*(-6.69138928738168E-01):d := -7.82960977114091E-02+I*(4.48795083710072E-01):e := -1.39193114812711E+00+I*(2.50116468981556E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.05271810567046E-01+I*(-1.46481271583519E-02):b := -6.23098092787944E-01+I*(7.21390120563102E-01):c := 8.32963239186061E-01+I*(-3.76113098394692E-01):d := -1.55592621829557E-01+I*(4.42206458637247E-01):e := 9.41340332732113E-01+I*(1.59902248635198E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.94882461015361E-01+I*(-2.37831379567460E-01):b := -7.26506565449225E-01+I*(3.83455197051714E-01):c := 6.94257699553341E-01+I*(-1.09982810649735E-01):d := -2.10570108040994E-01+I*(3.87474031037433E-01):e := 1.18722580344583E+00+I*(5.00265025411267E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.96673216809350E-01+I*(-5.30679046645459E-01):b := -5.88501669589333E-01+I*(5.81123417966963E-02):c := 4.16937840163106E-01+I*(4.72661515214715E-03):d := -2.17503979540689E-01+I*(3.10207712067759E-01):e := 1.04037335172095E+00+I*(-1.17866088231032E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.09806163410972E-01+I*(-7.56164450327268E-01):b := -2.73657429734682E-01+I*(-1.02406907445051E-01):c := 1.30764705290972E-01+I*(-8.56586361750096E-02):d := -1.73149800792538E-01+I*(2.46561271093620E-01):e := 8.05128659239489E-01+I*(-5.31353389780861E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.78281528098708E-01+I*(-8.08780464239047E-01):b := 7.07070351827725E-02+I*(-2.29938099805760E-02):c := -3.03581147962637E-02+I*(-3.38846301015053E-01):d := -9.82613849745873E-02+I*(2.26315585198213E-01):e := 4.96241355821955E-01+I*(-8.60324853350513E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.50498230096537E-01+I*(-8.09750343210494E-01):b := 2.12873955916100E-01+I*(1.65904308251065E-01):c := -1.66088372946999E-01+I*(-7.46016212600492E-01):d := -1.44039675038354E-01+I*(5.42931784674760E-01):e := -5.03859979818264E-02+I*(-6.42364540308843E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.52340791168383E-01+I*(-5.35176025996251E-01):b := 1.94465583628534E-01+I*(5.18827042821267E-01):c := 5.52741182658265E-02+I*(-9.48656791616812E-01):d := -1.11097329668358E-01+I*(6.13166850721725E-01):e := -2.70742203793762E-01+I*(-6.99824795262352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.53863750107019E-01+I*(-2.59376759675364E-01):b := -4.64904086276391E-02+I*(7.77348868868180E-01):c := 3.55102477985782E-01+I*(-9.61599414521726E-01):d := -1.31008259274871E-01+I*(6.88144964216945E-01):e := -6.08915146874076E-01+I*(-8.45809188303905E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.01145608875458E-01+I*(-1.11402086126796E-01):b := -3.97248034148194E-01+I*(8.20504550834395E-01):c := 5.93103684478855E-01+I*(-7.78788084216794E-01):d := -1.94455918609672E-01+I*(7.32783032567095E-01):e := -1.33162705247167E+00+I*(-1.53142306882903E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.12435994405233E-01+I*(-1.60490999659231E-01):b := -6.93683901715278E-01+I*(6.28101065505940E-01):c := 6.57914328138163E-01+I*(-4.85762253873318E-01):d := -2.71752442727820E-01+I*(7.26194407494270E-01):e := 2.01196875551185E+00+I*(-3.56697370678133E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.71746560430822E-02+I*(-3.83674252068338E-01):b := -7.97092374376561E-01+I*(2.90166141994552E-01):c := 5.19208788505444E-01+I*(-2.19631966128361E-01):d := -3.26729928939257E-01+I*(6.71461979894456E-01):e := 1.22988806770981E+00+I*(-8.22412338532970E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.89654118370716E-02+I*(-6.76521919146338E-01):b := -6.59087478516668E-01+I*(-3.51767132604651E-02):c := 2.41888929115208E-01+I*(-1.04922540326479E-01):d := -3.33663800438953E-01+I*(5.94195660924782E-01):e := 6.37184805804513E-01+I*(-6.28419824010254E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07901641561307E-01+I*(-9.02007322828147E-01):b := -3.44243238662017E-01+I*(-1.95695962502213E-01):c := -4.42842057569258E-02+I*(-1.95307791653635E-01):d := -2.89309621690801E-01+I*(5.30549219950642E-01):e := 3.44781133438122E-01+I*(-6.04593796899463E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95989333070986E-01+I*(-9.54623336739925E-01):b := 1.21226255437583E-04+I*(-1.16282865037737E-01):c := -2.05407025844161E-01+I*(-4.48495456493678E-01):d := -2.14421205872851E-01+I*(5.10303534055236E-01):e := 1.38604438509708E-01+I*(-6.14179734492997E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.11018075723839E-01+I*(-7.81532585690067E-01):b := 2.18767137934365E-01+I*(4.90690626225137E-02):c := -2.29702499975016E-01+I*(-9.42531609958292E-01):d := -4.15567195176753E-01+I*(6.85813081192628E-01):e := -1.55881610182723E-01+I*(-4.54895334275534E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01286063679568E+00+I*(-5.06958268475824E-01):b := 2.00358765646799E-01+I*(4.01991797192716E-01):c := -8.34000876218998E-03+I*(-1.14517218897461E+00):d := -3.82624849806757E-01+I*(7.56048147239593E-01):e := -2.69605091653989E-01+I*(-4.33759468124998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.14383595734321E-01+I*(-2.31159002154938E-01):b := -4.05972266093734E-02+I*(6.60513623239629E-01):c := 2.91488350957765E-01+I*(-1.15811481187953E+00):d := -4.02535779413270E-01+I*(8.31026260734813E-01):e := -4.15957029962874E-01+I*(-4.47856031365877E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.61665454502760E-01+I*(-8.31843286063697E-02):b := -3.91354852129928E-01+I*(7.03669305205844E-01):c := 5.29489557450838E-01+I*(-9.75303481574594E-01):d := -4.65983438748071E-01+I*(8.75664329084963E-01):e := -6.28177314072181E-01+I*(-5.67802289332709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.72955840032535E-01+I*(-1.32273242138804E-01):b := -6.87790719697013E-01+I*(5.11265819877389E-01):c := 5.94300201110147E-01+I*(-6.82277651231117E-01):d := -5.43279962866219E-01+I*(8.69075704012138E-01):e := -7.36457183814398E-01+I*(-1.07664905016715E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.83345189584220E-01+I*(-3.55456494547912E-01):b := -7.91199192358295E-01+I*(1.73330896366001E-01):c := 4.55594661477427E-01+I*(-4.16147363486160E-01):d := -5.98257449077656E-01+I*(8.14343276412324E-01):e := 1.43217195170322E-02+I*(-1.25648042700754E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.81554433790231E-01+I*(-6.48304161625911E-01):b := -6.53194296498402E-01+I*(-1.52011958889016E-01):c := 1.78274802087191E-01+I*(-3.01437937684278E-01):d := -6.05191320577351E-01+I*(7.37076957442650E-01):e := 1.60762208815139E-01+I*(-7.97688194145384E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.68421487188609E-01+I*(-8.73789565307720E-01):b := -3.38350056643751E-01+I*(-3.12531208130764E-01):c := -1.07898332784942E-01+I*(-3.91823189011435E-01):d := -5.60837141829199E-01+I*(6.73430516468510E-01):e := 5.66136904977574E-02+I*(-5.94062117112867E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.56509178698289E-01+I*(-9.26405579219499E-01):b := 6.01440827370333E-03+I*(-2.33118110666289E-01):c := -2.69021152872178E-01+I*(-6.45010853851478E-01):d := -4.85948726011250E-01+I*(6.53184830573104E-01):e := -5.18288345203755E-02+I*(-5.02435172486592E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07552507875579E+00+I*(-5.38128115368707E-01):b := 5.18175786344995E-01+I*(-1.77463515356967E-01):c := -1.60023433250308E-01+I*(-6.69255933909239E-01):d := -6.76423610130418E-01+I*(3.93425205531004E-01):e := -4.41471622968044E-01+I*(-2.85155207539700E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.17736763982763E+00+I*(-2.63553798154464E-01):b := 4.99767414057429E-01+I*(1.75459219213235E-01):c := 6.13390579625173E-02+I*(-8.71896512925558E-01):d := -6.43481264760422E-01+I*(4.63660271577969E-01):e := -4.48723388127041E-01+I*(-1.66869581514318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07889059876627E+00+I*(1.22454681664229E-02):b := 2.58811421801256E-01+I*(4.33981045260148E-01):c := 3.61167417682473E-01+I*(-8.84839135830472E-01):d := -6.63392194366935E-01+I*(5.38638385073190E-01):e := -4.82688480786319E-01+I*(-6.25075126477764E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.26172457534708E-01+I*(1.60220141714991E-01):b := -9.19462037192988E-02+I*(4.77136727226363E-01):c := 5.99168624175546E-01+I*(-7.02027805525540E-01):d := -7.26839853701736E-01+I*(5.83276453423340E-01):e := -5.51985602828798E-01+I*(4.38468202530082E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.37462843064484E-01+I*(1.11131228182557E-01):b := -3.88382071286384E-01+I*(2.84733241897909E-01):c := 6.63979267834855E-01+I*(-4.09001975182064E-01):d := -8.04136377819884E-01+I*(5.76687828350514E-01):e := -7.02113511189679E-01+I*(1.56340962777838E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.47852192616168E-01+I*(-1.12052024226551E-01):b := -4.91790543947666E-01+I*(-5.32016816134800E-02):c := 5.25273728202135E-01+I*(-1.42871687437107E-01):d := -8.59113864031321E-01+I*(5.21955400750700E-01):e := -1.06808328111694E+00+I*(1.62402646940329E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46061436822179E-01+I*(-4.04899691304551E-01):b := -3.53785648087772E-01+I*(-3.78544536868497E-01):c := 2.47953868811899E-01+I*(-2.81622616352252E-02):d := -8.66047735531017E-01+I*(4.44689081781026E-01):e := -1.26871838742307E+00+I*(-5.02324734037843E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.32928490220558E-01+I*(-6.30385094986360E-01):b := -3.89414082331218E-02+I*(-5.39063786110245E-01):c := -3.82192660602348E-02+I*(-1.18547512962382E-01):d := -8.21693556782865E-01+I*(3.81042640806887E-01):e := -6.81264246997246E-01+I*(-6.52835430274343E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.21016181730237E-01+I*(-6.83001108898138E-01):b := 3.05423056684333E-01+I*(-4.59650688645769E-01):c := -1.99342086147471E-01+I*(-3.71735177802425E-01):d := -7.46805140964915E-01+I*(3.60796954911480E-01):e := -4.81572667230783E-01+I*(-4.41895526499454E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09297480881630E+00+I*(-2.76666189410127E-01):b := 6.34259382383209E-01+I*(-1.91948091506133E-01):c := 2.24599764216401E-02+I*(-7.66028160042208E-01):d := -8.64284477760104E-01+I*(1.50833875305546E-01):e := -4.43015542314072E-01+I*(-1.17887826237635E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19481736988815E+00+I*(-2.09187219588368E-03):b := 6.15851010095643E-01+I*(1.60974643064069E-01):c := 2.43822467634466E-01+I*(-9.68668739058527E-01):d := -8.31342132390108E-01+I*(2.21068941352512E-01):e := -4.00936751333636E-01+I*(-4.16975303819773E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09634032882679E+00+I*(2.73707394125003E-01):b := 3.74895017839470E-01+I*(4.19496469110982E-01):c := 5.43650827354421E-01+I*(-9.81611361963441E-01):d := -8.51253061996621E-01+I*(2.96047054847732E-01):e := -3.89992817257004E-01+I*(3.17813141405324E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.43622187595225E-01+I*(4.21682067673571E-01):b := 2.41373923189155E-02+I*(4.62652151077197E-01):c := 7.81652033847495E-01+I*(-7.98800031658510E-01):d := -9.14700721331422E-01+I*(3.40685123197882E-01):e := -4.04302180218563E-01+I*(1.07543896140484E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54912573125000E-01+I*(3.72593154141137E-01):b := -2.72298475248169E-01+I*(2.70248665748743E-01):c := 8.46462677506803E-01+I*(-5.05774201315033E-01):d := -9.91997245449570E-01+I*(3.34096498125057E-01):e := -4.57191437037927E-01+I*(1.89474595945144E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.65301922676684E-01+I*(1.49409901732029E-01):b := -3.75706947909451E-01+I*(-6.76862577626459E-02):c := 7.07757137874083E-01+I*(-2.39643913570076E-01):d := -1.04697473166101E+00+I*(2.79364070525242E-01):e := -5.92966203451128E-01+I*(2.54113666243530E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.63511166882695E-01+I*(-1.43437765345970E-01):b := -2.37702052049558E-01+I*(-3.93029113017663E-01):c := 4.30437278483847E-01+I*(-1.24934487768194E-01):d := -1.05390860316070E+00+I*(2.02097751555568E-01):e := -8.16193314878060E-01+I*(1.38191353143407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.50378220281074E-01+I*(-3.68923169027779E-01):b := 7.71421878050927E-02+I*(-5.53548362259410E-01):c := 1.44264143611714E-01+I*(-2.15319739095351E-01):d := -1.00955442441255E+00+I*(1.38451310581428E-01):e := -7.52649569675912E-01+I*(-1.54573454003541E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.38465911790753E-01+I*(-4.21539182939558E-01):b := 4.21506652722547E-01+I*(-4.74135264794935E-01):c := -1.68586764755222E-02+I*(-4.68507403935394E-01):d := -9.34666008594600E-01+I*(1.18205624686022E-01):e := -5.46262821477171E-01+I*(-1.87871835137046E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.38277591152133E-01+I*(-6.51582636670957E-02):b := 7.32495082145796E-01+I*(-1.28426823354913E-01):c := 2.24454366282296E-01+I*(-7.22861911409140E-01):d := -8.52259550201034E-01+I*(-1.55756503219832E-01):e := -4.53962210246319E-01+I*(2.64294203044523E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04012015222398E+00+I*(2.09416053547147E-01):b := 7.14086709858230E-01+I*(2.24495911215289E-01):c := 4.45816857495122E-01+I*(-9.25502490425460E-01):d := -8.19317204831038E-01+I*(-8.55214371728668E-02):e := -3.80523187630513E-01+I*(6.43629706606358E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.41643111162615E-01+I*(4.85215319868034E-01):b := 4.73130717602057E-01+I*(4.83017737262202E-01):c := 7.45645217215078E-01+I*(-9.38445113330374E-01):d := -8.39228134437552E-01+I*(-1.05433236776466E-02):e := -3.40185168412440E-01+I*(1.15735449895428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.88924969931054E-01+I*(6.33189993416602E-01):b := 1.22373092081503E-01+I*(5.26173419228417E-01):c := 9.83646423708151E-01+I*(-7.55633783025442E-01):d := -9.02675793772353E-01+I*(3.40947446725035E-02):e := -3.21980972562112E-01+I*(1.75029013525173E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.00215355460830E-01+I*(5.84101079884168E-01):b := -1.74062775485582E-01+I*(3.33769933899962E-01):c := 1.04845706736746E+00+I*(-4.62607952681966E-01):d := -9.79972317890501E-01+I*(2.75061195996784E-02):e := -3.28035996873033E-01+I*(2.45492546394020E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.10604705012514E-01+I*(3.60917827475060E-01):b := -2.77471248146864E-01+I*(-4.16498961142638E-03):c := 9.09751527734739E-01+I*(-1.96477664937008E-01):d := -1.03494980410194E+00+I*(-2.72263080001360E-02):e := -3.80425976796172E-01+I*(3.26882524002333E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.08813949218525E-01+I*(6.80701603970603E-02):b := -1.39466352286971E-01+I*(-3.29507844866443E-01):c := 6.32431668344503E-01+I*(-8.17682391351268E-02):d := -1.04188367560163E+00+I*(-1.04492626969810E-01):e := -5.26701047453174E-01+I*(3.66836600451675E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95681002616903E-01+I*(-1.57415243284748E-01):b := 1.75377887567680E-01+I*(-4.90027094108191E-01):c := 3.46258533472370E-01+I*(-1.72153490462284E-01):d := -9.97529496853481E-01+I*(-1.68139067943950E-01):e := -6.68419712012828E-01+I*(2.09482643608743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.83768694126583E-01+I*(-2.10031257196527E-01):b := 5.19742352485135E-01+I*(-4.10613996643716E-01):c := 1.85135713385134E-01+I*(-4.25341155302326E-01):d := -9.22641081035531E-01+I*(-1.88384753839356E-01):e := -5.76847210770404E-01+I*(4.20690122424149E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.83817973176408E-01+I*(-2.57124724353591E-03):b := 7.66917309945651E-01+I*(-1.66220182315235E-02):c := 3.51444316398276E-01+I*(-5.59955155484865E-01):d := -6.45975424700282E-01+I*(-3.82888884560594E-01):e := -4.76665855724508E-01+I*(1.86413487841192E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.85660534248254E-01+I*(2.72003069970708E-01):b := 7.48508937658085E-01+I*(3.36300716338678E-01):c := 5.72806807611102E-01+I*(-7.62595734501185E-01):d := -6.13033079330286E-01+I*(-3.12653818513629E-01):e := -3.76968608746182E-01+I*(1.75749904242580E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.87183493186890E-01+I*(5.47802336291594E-01):b := 5.07552945401912E-01+I*(5.94822542385591E-01):c := 8.72635167331057E-01+I*(-7.75538357406099E-01):d := -6.32944008936800E-01+I*(-2.37675705018408E-01):e := -3.09720026161379E-01+I*(2.02946231239290E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.34465351955329E-01+I*(6.95777009840162E-01):b := 1.56795319881357E-01+I*(6.37978224351807E-01):c := 1.11063637382413E+00+I*(-5.92727027101167E-01):d := -6.96391668271601E-01+I*(-1.93037636668258E-01):e := -2.64343668712591E-01+I*(2.46745778762261E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.45755737485105E-01+I*(6.46688096307728E-01):b := -1.39640547685728E-01+I*(4.45574739023352E-01):c := 1.17544701748344E+00+I*(-2.99701196757691E-01):d := -7.73688192389749E-01+I*(-1.99626261741084E-01):e := -2.36350253067259E-01+I*(3.06414702733186E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.38549129632108E-02+I*(4.23504843898620E-01):b := -2.43049020347010E-01+I*(1.07639815511964E-01):c := 1.03674147785072E+00+I*(-3.35709090127334E-02):d := -8.28665678601186E-01+I*(-2.54358689340898E-01):e := -2.34909557798509E-01+I*(3.89271114415953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56456687572001E-02+I*(1.30657176820621E-01):b := -1.05044124487117E-01+I*(-2.17703039743053E-01):c := 7.59421618460484E-01+I*(8.11385167891484E-02):d := -8.35599550100881E-01+I*(-3.31625008310572E-01):e := -3.02088115298491E-01+I*(4.93356043319286E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.41221384641178E-01+I*(-9.48282268611883E-02):b := 2.09800115367534E-01+I*(-3.78222288984801E-01):c := 4.73248483588350E-01+I*(-9.24673453800821E-03):d := -7.91245371352729E-01+I*(-3.95271449284712E-01):e := -4.94546638219198E-01+I*(5.06697901556682E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.29309076150858E-01+I*(-1.47444240772967E-01):b := 5.54164580284989E-01+I*(-2.98809191520326E-01):c := 3.12125663501114E-01+I*(-2.62434399378051E-01):d := -7.16356955534779E-01+I*(-4.15517135180118E-01):e := -5.80741449387545E-01+I*(3.05548468156941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.48660438143613E-01+I*(-1.18190300701238E-01):b := 7.21419522834772E-01+I*(9.11516129748037E-02):c := 3.44009817774226E-01+I*(-3.53533773873271E-01):d := -3.41954736172333E-01+I*(-4.24285503192159E-01):e := -5.30774326243472E-01+I*(4.20986531593129E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.50502999215460E-01+I*(1.56384016513005E-01):b := 7.03011150547205E-01+I*(4.44074347545006E-01):c := 5.65372308987051E-01+I*(-5.56174352889590E-01):d := -3.09012390802337E-01+I*(-3.54050437145193E-01):e := -3.99940771326503E-01+I*(3.22280381618998E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52025958154095E-01+I*(4.32183282833892E-01):b := 4.62055158291033E-01+I*(7.02596173591918E-01):c := 8.65200668707006E-01+I*(-5.69116975794504E-01):d := -3.28923320408851E-01+I*(-2.79072323649973E-01):e := -2.96148352166768E-01+I*(3.12862673881533E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.99307816922534E-01+I*(5.80157956382460E-01):b := 1.11297532770478E-01+I*(7.45751855558134E-01):c := 1.10320187520008E+00+I*(-3.86305645489572E-01):d := -3.92370979743652E-01+I*(-2.34434255299823E-01):e := -2.18238122303321E-01+I*(3.36189024891381E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.94017975476903E-02+I*(5.31069042850026E-01):b := -1.85138334796607E-01+I*(5.53348370229680E-01):c := 1.16801251885939E+00+I*(-9.32798151460961E-02):d := -4.69667503861800E-01+I*(-2.41022880372648E-01):e := -1.54896511426046E-01+I*(3.81132372973259E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.79012447996006E-01+I*(3.07885790440918E-01):b := -2.88546807457889E-01+I*(2.15413446718291E-01):c := 1.02930697922667E+00+I*(1.72850472598861E-01):d := -5.24644990073237E-01+I*(-2.95755307972463E-01):e := -1.03176301997892E-01+I*(4.55365194299133E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.80803203789995E-01+I*(1.50381233629184E-02):b := -1.50541911597996E-01+I*(-1.09929408536726E-01):c := 7.51987119836433E-01+I*(2.87559898400743E-01):d := -5.31578861572932E-01+I*(-3.73021626942137E-01):e := -8.31988157727762E-02+I*(5.83415068171599E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.39361503916165E-02+I*(-2.10447280318890E-01):b := 1.64302328256655E-01+I*(-2.70448657778474E-01):c := 4.65813984964299E-01+I*(1.97174647073586E-01):d := -4.87224682824780E-01+I*(-4.36668067916277E-01):e := -2.04124810537243E-01+I*(7.67832745155980E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.94151541118063E-01+I*(-2.63063294230669E-01):b := 5.08666793174109E-01+I*(-1.91035560313998E-01):c := 3.04691164877063E-01+I*(-5.60130177664569E-02):d := -4.12336267006830E-01+I*(-4.56913753811682E-01):e := -5.24264536489714E-01+I*(6.99956611985190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.42837810180481E-01+I*(-3.57915983964695E-01):b := 6.17290641053918E-01+I*(1.44465590452136E-01):c := 2.05629554941586E-01+I*(-2.00184625148538E-01):d := -8.24521435930031E-02+I*(-2.60576421184648E-01):e := -7.51277797245277E-01+I*(9.43746090765790E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.44680371252327E-01+I*(-8.33416667504521E-02):b := 5.98882268766352E-01+I*(4.97388325022338E-01):c := 4.26992046154412E-01+I*(-4.02825204164858E-01):d := -4.95097982230072E-02+I*(-1.90341355137683E-01):e := -5.22843426351895E-01+I*(5.68881298299927E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46203330190963E-01+I*(1.92457599570434E-01):b := 3.57926276510179E-01+I*(7.55910151069250E-01):c := 7.26820405874367E-01+I*(-4.15767827069772E-01):d := -6.94207278295206E-02+I*(-1.15363241642462E-01):e := -3.27101198422579E-01+I*(4.85096073343048E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.34851889594024E-02+I*(3.40432273119003E-01):b := 7.16865098962500E-03+I*(7.99065833035466E-01):c := 9.64821612367440E-01+I*(-2.32956496764840E-01):d := -1.32868387164322E-01+I*(-7.07251732923126E-02):e := -1.86915375633573E-01+I*(4.74645162347007E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.95224425510822E-01+I*(2.91343359586568E-01):b := -2.89267216577460E-01+I*(6.06662347707011E-01):c := 1.02963225602675E+00+I*(6.00693335786361E-02):d := -2.10164911282470E-01+I*(-7.73137983651380E-02):e := -6.86023236014859E-02+I*(4.94739369810766E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.84835075959138E-01+I*(6.81601071774608E-02):b := -3.92675689238742E-01+I*(2.68727424195623E-01):c := 8.90926716394029E-01+I*(3.26199621323594E-01):d := -2.65142397493907E-01+I*(-1.32046225964953E-01):e := 4.99598164862737E-02+I*(5.44835043672869E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.86625831753127E-01+I*(-2.24687559900539E-01):b := -2.54670793378849E-01+I*(-5.66154310593943E-02):c := 6.13606857003793E-01+I*(4.40909047125475E-01):d := -2.72076268993602E-01+I*(-2.09312544934626E-01):e := 1.86163946141884E-01+I*(6.55771642344466E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.99758778354749E-01+I*(-4.50172963582348E-01):b := 6.01734464758018E-02+I*(-2.17134680301142E-01):c := 3.27433722131659E-01+I*(3.50523795798319E-01):d := -2.27722090245450E-01+I*(-2.72958985908766E-01):e := 3.17275111723174E-01+I*(9.49116069918232E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.83289131549305E-02+I*(-5.02788977494127E-01):b := 4.04537911393256E-01+I*(-1.37721582836667E-01):c := 1.66310902044424E-01+I*(9.73361309582759E-02):d := -1.52833674427500E-01+I*(-2.93204671804172E-01):e := -1.07889638171719E-01+I*(1.53914723104687E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.15865672998467E-01+I*(-6.09577985580737E-01):b := 5.03253725651967E-01+I*(1.18373711619969E-01):c := 1.05319080506243E-03+I*(-1.71661480284918E-01):d := 1.11082059197753E-02+I*(3.16370625668417E-02):e := -4.91300954084673E+00+I*(7.73268553950687E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.17708234070313E-01+I*(-3.35003668366494E-01):b := 4.84845353364401E-01+I*(4.71296446190171E-01):c := 2.22415682017888E-01+I*(-3.74302059301238E-01):d := 4.40505512897713E-02+I*(1.01872128613807E-01):e := -1.31597957878328E+00+I*(7.91295662717235E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.19231193008949E-01+I*(-5.92044020456073E-02):b := 2.43889361108228E-01+I*(7.29818272237084E-01):c := 5.22244041737843E-01+I*(-3.87244682206152E-01):d := 2.41396216832579E-02+I*(1.76850242109027E-01):e := -6.09508072542283E-01+I*(7.64226627148530E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.66513051777388E-01+I*(8.87702715029614E-02):b := -1.06868264412327E-01+I*(7.72973954203300E-01):c := 7.60245248230917E-01+I*(-2.04433351901220E-01):d := -3.93080376515435E-02+I*(2.21488310459177E-01):e := -2.47816101312155E-01+I*(7.46470329905527E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.22196562692837E-01+I*(3.96813579705269E-02):b := -4.03304131979412E-01+I*(5.80570468874845E-01):c := 8.25055891890225E-01+I*(8.85924784422563E-02):d := -1.16604561769691E-01+I*(2.14899685386352E-01):e := 2.28709970099308E-02+I*(7.31452516906198E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.11807213141152E-01+I*(-1.83501894438581E-01):b := -5.06712604640693E-01+I*(2.42635545363456E-01):c := 6.86350352257506E-01+I*(3.54722766187213E-01):d := -1.71582047981128E-01+I*(1.60167257786537E-01):e := 2.88187127125440E-01+I*(7.15294709146174E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13597968935142E-01+I*(-4.76349561516581E-01):b := -3.68707708780801E-01+I*(-8.27073098915607E-02):c := 4.09030492867270E-01+I*(4.69432191989095E-01):d := -1.78515919480823E-01+I*(8.29009388168636E-02):e := 6.26694198667519E-01+I*(6.92610523826070E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.26730915536763E-01+I*(-7.01834965198389E-01):b := -5.38634689261497E-02+I*(-2.43226559133308E-01):c := 1.22857357995136E-01+I*(3.79046940661939E-01):d := -1.34161740732672E-01+I*(1.92544978427236E-02):e := 1.23988382799147E+00+I*(6.45601983420294E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61356775972916E-01+I*(-7.54450979110168E-01):b := 2.90500995991305E-01+I*(-1.63813461668833E-01):c := -3.82654620920998E-02+I*(1.25859275821895E-01):d := -5.92733249147214E-02+I*(-9.91188052682305E-04):e := 3.62968371222153E+00+I*(3.89197039564050E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.33573477970745E-01+I*(-7.55420858081615E-01):b := 4.32667916724632E-01+I*(2.50846565628078E-02):c := -1.73995720242835E-01+I*(-2.81310635763544E-01):d := -1.05051614978488E-01+I*(3.15625011423864E-01):e := -6.50679946777521E-01+I*(-1.19365177644884E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.35416039042591E-01+I*(-4.80846540867372E-01):b := 4.14259544437066E-01+I*(3.78007391133010E-01):c := 4.73667709699905E-02+I*(-4.83951214779864E-01):d := -7.21092696084920E-02+I*(3.85860077470830E-01):e := -1.14224468390391E+00+I*(-5.48249782607621E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.36938997981227E-01+I*(-2.05047274546486E-01):b := 1.73303552180893E-01+I*(6.36529217179923E-01):c := 3.47195130689946E-01+I*(-4.96893837684778E-01):d := -9.20201992150053E-02+I*(4.60838190966050E-01):e := -1.23407144191491E+00+I*(1.91311358743464E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.84220856749666E-01+I*(-5.70726009979172E-02):b := -1.77454073339662E-01+I*(6.79684899146138E-01):c := 5.85196337183019E-01+I*(-3.14082507379846E-01):d := -1.55467858549807E-01+I*(5.05476259316200E-01):e := -9.43254217828091E-01+I*(9.01555435279958E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.55112422794415E-02+I*(-1.06161514530352E-01):b := -4.73889940906747E-01+I*(4.87281413817684E-01):c := 6.50006980842328E-01+I*(-2.10566770363694E-02):d := -2.32764382667955E-01+I*(4.98887634243375E-01):e := -2.27588286357514E-01+I*(1.41542383731513E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.40994081688740E-02+I*(-3.29344766939459E-01):b := -5.77298413568028E-01+I*(1.49346490306295E-01):c := 5.11301441209608E-01+I*(2.45073610708588E-01):d := -2.87741868879391E-01+I*(4.44155206643560E-01):e := 8.57915050528328E-01+I*(1.36186883566719E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.58901639628632E-02+I*(-6.22192434017459E-01):b := -4.39293517708136E-01+I*(-1.75996364948722E-01):c := 2.33981581819372E-01+I*(3.59783036510470E-01):d := -2.94675740379087E-01+I*(3.66888887673886E-01):e := 1.69779159685211E+00+I*(3.50917915374039E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.09768894355153E-02+I*(-8.47677837699268E-01):b := -1.24449277853485E-01+I*(-3.36515614190470E-01):c := -5.21915530527617E-02+I*(2.69397785183313E-01):d := -2.50321561630935E-01+I*(3.03242446699746E-01):e := 1.36804868656091E+00+I*(-9.86044473228884E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.79064580945195E-01+I*(-9.00293851611047E-01):b := 2.19915187063970E-01+I*(-2.57102516725994E-01):c := -2.13314373139997E-01+I*(1.62101203432698E-02):d := -1.75433145812985E-01+I*(2.82996760804341E-01):e := 2.74083452352730E-01+I*(-1.49312410616945E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.94093323598047E-01+I*(-7.27203100561189E-01):b := 4.38561098742897E-01+I*(-9.17505890657434E-02):c := -2.37609847270852E-01+I*(-4.77826033121343E-01):d := -3.76579135116887E-01+I*(4.58506307941732E-01):e := -4.62855310760425E-01+I*(-5.45247142106248E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.95935884669894E-01+I*(-4.52628783346945E-01):b := 4.20152726455332E-01+I*(2.61172145504459E-01):c := -1.62473560580260E-02+I*(-6.80466612137663E-01):d := -3.43636789746891E-01+I*(5.28741373988697E-01):e := -5.80354202794510E-01+I*(-3.49586778381033E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.97458843608529E-01+I*(-1.76829517026059E-01):b := 1.79196734199159E-01+I*(5.19693971551372E-01):c := 2.83581003661929E-01+I*(-6.93409235042577E-01):d := -3.63547719353404E-01+I*(6.03719487483918E-01):e := -7.09274047829730E-01+I*(-1.56934045682854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.44740702376969E-01+I*(-2.88548434774908E-02):b := -1.71560891321396E-01+I*(5.62849653517587E-01):c := 5.21582210155003E-01+I*(-5.10597904737645E-01):d := -4.26995378688206E-01+I*(6.48357555834067E-01):e := -8.94742001132168E-01+I*(8.84969982003100E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56031087906744E-01+I*(-7.79437570099251E-02):b := -4.67996758888481E-01+I*(3.70446168189133E-01):c := 5.86392853814311E-01+I*(-2.17572074394169E-01):d := -5.04291902806353E-01+I*(6.41768930761242E-01):e := -1.29487369223704E+00+I*(5.24239480889907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.66420437458428E-01+I*(-3.01127009419033E-01):b := -5.71405231549763E-01+I*(3.25112446777439E-02):c := 4.47687314181591E-01+I*(4.85582133507882E-02):d := -5.59269389017791E-01+I*(5.87036503161428E-01):e := -3.67708343485576E+00+I*(1.75216092020519E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64629681664439E-01+I*(-5.93974676497032E-01):b := -4.33400335689870E-01+I*(-2.92831610577273E-01):c := 1.70367454791355E-01+I*(1.63267639152670E-01):d := -5.66203260517486E-01+I*(5.09770184191754E-01):e := 1.31167217800884E-01+I*(-3.29169980654188E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.51496735062818E-01+I*(-8.19460080178841E-01):b := -1.18556095835219E-01+I*(-4.53350859819021E-01):c := -1.15805680080778E-01+I*(7.28823878255131E-02):d := -5.21849081769334E-01+I*(4.46123743217614E-01):e := -1.20929228220949E-01+I*(-1.29281656178126E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.39584426572497E-01+I*(-8.72076094090620E-01):b := 2.25808369082236E-01+I*(-3.73937762354546E-01):c := -2.76928500168014E-01+I*(-1.80305277014530E-01):d := -4.46960665951384E-01+I*(4.25878057322208E-01):e := -3.26500745352823E-01+I*(-8.03717966613598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04098114444047E+00+I*(-2.26305418923279E-01):b := 3.70351321284288E-01+I*(-1.58733656254882E-01):c := -5.29256161606519E-02+I*(-2.97878808833022E-01):d := -6.19747159221053E-01+I*(9.09051541733829E-03):e := -6.57667953226582E-01+I*(-7.97230115753418E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.14282370551231E+00+I*(4.82688982909638E-02):b := 3.51942948996723E-01+I*(1.94189078315320E-01):c := 1.68436875052173E-01+I*(-5.00519387849342E-01):d := -5.86804813851057E-01+I*(7.93255814643035E-02):e := -5.19949265208371E-01+I*(7.90789183888918E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04434666445095E+00+I*(3.24068164611850E-01):b := 1.10986956740550E-01+I*(4.52710904362233E-01):c := 4.68265234772129E-01+I*(-5.13462010754256E-01):d := -6.06715743457570E-01+I*(1.54303694959524E-01):e := -4.45102611244234E-01+I*(1.70380358038856E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.91628523219389E-01+I*(4.72042838160418E-01):b := -2.39770668780005E-01+I*(4.95866586328448E-01):c := 7.06266441265202E-01+I*(-3.30650680449324E-01):d := -6.70163402792372E-01+I*(1.98941763309674E-01):e := -4.00084534803098E-01+I*(2.68762643250317E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02918908749165E-01+I*(4.22953924627984E-01):b := -5.36206536347089E-01+I*(3.03463100999994E-01):c := 7.71077084924510E-01+I*(-3.76248501058481E-02):d := -7.47459926910519E-01+I*(1.92353138236849E-01):e := -3.79749853886569E-01+I*(3.90778268880878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13308258300849E-01+I*(1.99770672218876E-01):b := -6.39615009008371E-01+I*(-3.44718225113946E-02):c := 6.32371545291790E-01+I*(2.28505437639109E-01):d := -8.02437413121956E-01+I*(1.37620710637034E-01):e := -4.12288263362288E-01+I*(5.67931641984258E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.11517502506860E-01+I*(-9.30769948591230E-02):b := -5.01610113148479E-01+I*(-3.59814677766411E-01):c := 3.55051685901555E-01+I*(3.43214863440991E-01):d := -8.09371284621652E-01+I*(6.03543916673603E-02):e := -6.57373333574053E-01+I*(8.10780945946035E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.98384555905238E-01+I*(-3.18562398540932E-01):b := -1.86765873293828E-01+I*(-5.20333927008159E-01):c := 6.88785510294219E-02+I*(2.52829612113834E-01):d := -7.65017105873500E-01+I*(-3.29204930677958E-03):e := -1.24714215888115E+00+I*(5.09416111048199E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.86472247414918E-01+I*(-3.71178412452711E-01):b := 1.57598591623626E-01+I*(-4.40920829543684E-01):c := -9.22442690578138E-02+I*(-3.58052726208382E-04):d := -6.90128690055550E-01+I*(-2.35377352021857E-02):e := -9.52648396334059E-01+I*(-1.85979170507889E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05843087450098E+00+I*(3.51565070353013E-02):b := 4.86434917322503E-01+I*(-1.73218232404048E-01):c := 1.29557793511296E-01+I*(-3.94651034965991E-01):d := -8.07608026850739E-01+I*(-2.33500814808120E-01):e := -4.69248041063151E-01+I*(1.04717912937444E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.16027343557283E+00+I*(3.09730824249544E-01):b := 4.68026545034938E-01+I*(1.79704502166154E-01):c := 3.50920284724122E-01+I*(-5.97291613982311E-01):d := -7.74665681480743E-01+I*(-1.63265748761155E-01):e := -3.80301354916953E-01+I*(1.20536174649793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06179639451147E+00+I*(5.85530090570431E-01):b := 2.27070552778765E-01+I*(4.38226328213067E-01):c := 6.50748644444077E-01+I*(-6.10234236887225E-01):d := -7.94576611087256E-01+I*(-8.82876352659343E-02):e := -3.25360157133784E-01+I*(1.60956998485326E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.09078253279906E-01+I*(7.33504764118999E-01):b := -1.23687072741790E-01+I*(4.81382010179283E-01):c := 8.88749850937150E-01+I*(-4.27422906582293E-01):d := -8.58024270422057E-01+I*(-4.36495669157840E-02):e := -2.92397385957677E-01+I*(2.13329800601180E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.20368638809681E-01+I*(6.84415850586564E-01):b := -4.20122940308875E-01+I*(2.88978524850828E-01):c := 9.53560494596458E-01+I*(-1.34397076238817E-01):d := -9.35320794540205E-01+I*(-5.02381919886091E-02):e := -2.79711239478746E-01+I*(2.79540745656292E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.30757988361365E-01+I*(4.61232598177456E-01):b := -5.23531412970157E-01+I*(-4.89563986605606E-02):c := 8.14854954963738E-01+I*(1.31733211506140E-01):d := -9.90298280751642E-01+I*(-1.04970619588424E-01):e := -3.02447011566020E-01+I*(3.64828223108609E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.28967232567376E-01+I*(1.68384931099457E-01):b := -3.85526517110264E-01+I*(-3.74299253915577E-01):c := 5.37535095573503E-01+I*(2.46442637308022E-01):d := -9.97232152251337E-01+I*(-1.82236938558097E-01):e := -4.09721827659969E-01+I*(4.47479424144827E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.15834285965755E-01+I*(-5.71004725823515E-02):b := -7.06822772556138E-02+I*(-5.34818503157325E-01):c := 2.51361960701370E-01+I*(1.56057385980865E-01):d := -9.52877973503186E-01+I*(-2.45883379532237E-01):e := -5.98977834096023E-01+I*(3.76411533331718E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.03921977475434E-01+I*(-1.09716486494130E-01):b := 2.73682187661841E-01+I*(-4.55405405692850E-01):c := 9.02391406141342E-02+I*(-9.71302788591775E-02):d := -8.77989557685236E-01+I*(-2.66129065427644E-01):e := -5.91917665824374E-01+I*(1.71220148326999E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.03733656836814E-01+I*(2.46664432778332E-01):b := 5.84670617085091E-01+I*(-1.09696964252829E-01):c := 3.31552183371952E-01+I*(-3.51484786332924E-01):d := -7.95583099291669E-01+I*(-5.40091193333498E-01):e := -3.65890746805823E-01+I*(1.97302335229922E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00557621790866E+00+I*(5.21238749992575E-01):b := 5.66262244797525E-01+I*(2.43225770317374E-01):c := 5.52914674584778E-01+I*(-5.54125365349243E-01):d := -7.62640753921673E-01+I*(-4.69856127286533E-01):e := -3.01101080642385E-01+I*(1.75795655550111E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.07099176847296E-01+I*(7.97038016313461E-01):b := 3.25306252541352E-01+I*(5.01747596364287E-01):c := 8.52743034304733E-01+I*(-5.67067988254157E-01):d := -7.82551683528186E-01+I*(-3.94878013791312E-01):e := -2.51005650603157E-01+I*(1.87550028083178E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.54381035615734E-01+I*(9.45012689862028E-01):b := -2.54513729792030E-02+I*(5.44903278330502E-01):c := 1.09074424079781E+00+I*(-3.84256657949225E-01):d := -8.45999342862987E-01+I*(-3.50239945441162E-01):e := -2.15781693382053E-01+I*(2.15578628095550E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.65671421145511E-01+I*(8.95923776329594E-01):b := -3.21887240546287E-01+I*(3.52499793002047E-01):c := 1.15555488445711E+00+I*(-9.12308276057494E-02):d := -9.23295866981135E-01+I*(-3.56828570513987E-01):e := -1.94375043122995E-01+I*(2.56568362254647E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76060770697195E-01+I*(6.72740523920486E-01):b := -4.25295713207570E-01+I*(1.45648694906589E-02):c := 1.01684934482439E+00+I*(1.74899460139208E-01):d := -9.78273353192572E-01+I*(-4.11560998113801E-01):e := -1.93592346868576E-01+I*(3.12264165632646E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74270014903206E-01+I*(3.79892856842487E-01):b := -2.87290817347677E-01+I*(-3.10777985764358E-01):c := 7.39529485434159E-01+I*(2.89608885941089E-01):d := -9.85207224692268E-01+I*(-4.88827317083475E-01):e := -2.36881354989164E-01+I*(3.75787380621382E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.61137068301585E-01+I*(1.54407453160679E-01):b := 2.75534225069736E-02+I*(-4.71297235006106E-01):c := 4.53356350562026E-01+I*(1.99223634613932E-01):d := -9.40853045944117E-01+I*(-5.52473758057615E-01):e := -3.44723055210739E-01+I*(3.86767944570066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.49224759811264E-01+I*(1.01791439248901E-01):b := 3.71917887424428E-01+I*(-3.91884137541631E-01):c := 2.92233530474790E-01+I*(-5.39640302261102E-02):d := -8.65964630126166E-01+I*(-5.72719443953022E-01):e := -4.10619030558858E-01+I*(2.84253146316403E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.49274038861089E-01+I*(3.09251449201892E-01):b := 6.19092844884945E-01+I*(2.10784087056171E-03):c := 4.58542133487932E-01+I*(-1.88578030408649E-01):d := -5.89298973790917E-01+I*(-7.67223574674260E-01):e := -2.89748044474146E-01+I*(2.87080574194375E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.51116599932935E-01+I*(5.83825766416135E-01):b := 6.00684472597379E-01+I*(3.55030575440764E-01):c := 6.79904624700758E-01+I*(-3.91218609424968E-01):d := -5.56356628420921E-01+I*(-6.96988508627295E-01):e := -2.46172724526063E-01+I*(2.37831668657463E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.52639558871571E-01+I*(8.59625032737021E-01):b := 3.59728480341207E-01+I*(6.13552401487677E-01):c := 9.79732984420713E-01+I*(-4.04161232329882E-01):d := -5.76267558027434E-01+I*(-6.22010395132074E-01):e := -1.98682239504027E-01+I*(2.27219772422795E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.99921417640010E-01+I*(1.00759970628559E+00):b := 8.97085482065147E-03+I*(6.56708083453893E-01):c := 1.21773419091379E+00+I*(-2.21349902024950E-01):d := -6.39715217362235E-01+I*(-5.77372326781924E-01):e := -1.59400516794558E-01+I*(2.37920202111659E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.11211803169785E-01+I*(9.58510792753155E-01):b := -2.87465012746433E-01+I*(4.64304598125438E-01):c := 1.28254483457309E+00+I*(7.16759283185256E-02):d := -7.17011741480383E-01+I*(-5.83960951854749E-01):e := -1.29165702662779E-01+I*(2.63460047798624E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.83988472785296E-02+I*(7.35327540344047E-01):b := -3.90873485407715E-01+I*(1.26369674614049E-01):c := 1.14383929494037E+00+I*(3.37806216063482E-01):d := -7.71989227691821E-01+I*(-6.38693379454563E-01):e := -1.11252998440749E-01+I*(3.04530576002654E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.01896030725186E-02+I*(4.42479873266048E-01):b := -2.52868589547823E-01+I*(-1.98973180640968E-01):c := 8.66519435550139E-01+I*(4.52515641865364E-01):d := -7.78923099191516E-01+I*(-7.15959698424237E-01):e := -1.20020324153210E-01+I*(3.62123546251790E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06677450325860E-01+I*(2.16994469584239E-01):b := 6.19756503068282E-02+I*(-3.59492429882716E-01):c := 5.80346300678006E-01+I*(3.62130390538207E-01):d := -7.34568920443365E-01+I*(-7.79606139398378E-01):e := -1.84474580220996E-01+I*(4.11130616528205E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.94765141835539E-01+I*(1.64378455672461E-01):b := 4.06340115224283E-01+I*(-2.80079332418240E-01):c := 4.19223480590770E-01+I*(1.08942725698165E-01):d := -6.59680504625414E-01+I*(-7.99851825293784E-01):e := -2.77126990769790E-01+I*(3.75909002217289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.14116503828295E-01+I*(1.93632395744190E-01):b := 5.73595057774066E-01+I*(1.09881472076889E-01):c := 4.51107634863882E-01+I*(1.78433512029454E-02):d := -2.85278285262969E-01+I*(-8.08620193305825E-01):e := -2.20422684806637E-01+I*(3.94710647318548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.15959064900141E-01+I*(4.68206712958433E-01):b := 5.55186685486500E-01+I*(4.62804206647091E-01):c := 6.72470126076707E-01+I*(-1.84797227813374E-01):d := -2.52335939892972E-01+I*(-7.38385127258859E-01):e := -2.03520086084635E-01+I*(3.16406752455763E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.17482023838776E-01+I*(7.44005979279319E-01):b := 3.14230693230327E-01+I*(7.21326032694004E-01):c := 9.72298485796662E-01+I*(-1.97739850718288E-01):d := -2.72246869499485E-01+I*(-6.63407013763639E-01):e := -1.58225471653704E-01+I*(2.81454092057639E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64763882607215E-01+I*(8.91980652827887E-01):b := -3.65269322902280E-02+I*(7.64481714660220E-01):c := 1.21029969228974E+00+I*(-1.49285204133559E-02):d := -3.35694528834286E-01+I*(-6.18768945413489E-01):e := -1.13407850835596E-01+I*(2.75150100778608E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.23945731863009E-01+I*(8.42891739295453E-01):b := -3.32962799857312E-01+I*(5.72078229331765E-01):c := 1.27511033594904E+00+I*(2.78097309930119E-01):d := -4.12991052952434E-01+I*(-6.25357570486314E-01):e := -7.36532626961592E-02+I*(2.87325237977599E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13556382311324E-01+I*(6.19708486886345E-01):b := -4.36371272518594E-01+I*(2.34143305820377E-01):c := 1.13640479631632E+00+I*(5.44227597675077E-01):d := -4.67968539163872E-01+I*(-6.80089998086128E-01):e := -4.04019035533113E-02+I*(3.17147038791269E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.15347138105313E-01+I*(3.26860819808345E-01):b := -2.98366376658702E-01+I*(-9.11995494346404E-02):c := 8.59084936926088E-01+I*(6.58937023476958E-01):d := -4.74902410663567E-01+I*(-7.57356317055802E-01):e := -2.21820007462546E-02+I*(3.69887579270216E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28480084706935E-01+I*(1.01375416126537E-01):b := 1.64778631959486E-02+I*(-2.51718798676388E-01):c := 5.72911802053955E-01+I*(5.68551772149801E-01):d := -4.30548231915416E-01+I*(-8.21002758029942E-01):e := -4.87340426528172E-02+I*(4.42998273270673E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59607606802745E-01+I*(4.87594022147587E-02):b := 3.60842328113403E-01+I*(-1.72305701211913E-01):c := 4.11788981966720E-01+I*(3.15364107309759E-01):d := -3.55659816097465E-01+I*(-8.41248443925348E-01):e := -1.48501541207816E-01+I*(4.71593390991842E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.08293875865162E-01+I*(-4.60932875192677E-02):b := 4.69466175993212E-01+I*(1.63195449554221E-01):c := 3.12727372031242E-01+I*(1.71192499927678E-01):d := -2.57756926836385E-02+I*(-6.44911111298314E-01):e := -1.48267285812661E-01+I*(5.62400005276726E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.10136436937009E-01+I*(2.28481029694976E-01):b := 4.51057803705647E-01+I*(5.16118184124423E-01):c := 5.34089863244067E-01+I*(-3.14480790886417E-02):d := 7.16665268635787E-03+I*(-5.74676045251349E-01):e := -1.77087376892432E-01+I*(4.36593953993215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.11659395875644E-01+I*(5.04280296015862E-01):b := 2.10101811449474E-01+I*(7.74640010171336E-01):c := 8.33918222964022E-01+I*(-4.43907019935558E-02):d := -1.27442769201553E-02+I*(-4.99697931756128E-01):e := -1.31366026004683E-01+I*(3.63922923876238E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89412546440831E-02+I*(6.52254969564430E-01):b := -1.40655814071081E-01+I*(8.17795692137552E-01):c := 1.07191942945710E+00+I*(1.38420628311376E-01):d := -7.61919362549567E-02+I*(-4.55059863405978E-01):e := -7.56479250539820E-02+I*(3.35302386522276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.29768359826141E-01+I*(6.03166056031995E-01):b := -4.37091681638165E-01+I*(6.25392206809097E-01):c := 1.13673007311640E+00+I*(4.31446458654852E-01):d := -1.53488460373104E-01+I*(-4.61648488478803E-01):e := -2.18342868156330E-02+I*(3.32222085103368E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.19379010274457E-01+I*(3.79982803622887E-01):b := -5.40500154299448E-01+I*(2.87457283297708E-01):c := 9.98024533483684E-01+I*(6.97576746399809E-01):d := -2.08465946584542E-01+I*(-5.16380916078618E-01):e := 3.02663936467001E-02+I*(3.50234198561448E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.21169766068446E-01+I*(8.71351365448882E-02):b := -4.02495258439555E-01+I*(-3.78855719573083E-02):c := 7.20704674093449E-01+I*(8.12286172201691E-01):d := -2.15399818084237E-01+I*(-5.93647235048291E-01):e := 7.83302628421254E-02+I*(3.96886979114336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.34302712670067E-01+I*(-1.38350267136921E-01):b := -8.76510185849046E-02+I*(-1.98404821199056E-01):c := 4.34531539221316E-01+I*(7.21900920874534E-01):d := -1.71045639336086E-01+I*(-6.57293676022431E-01):e := 9.86060275728158E-02+I*(4.89925463418911E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.37849788396122E-02+I*(-1.90966281048699E-01):b := 2.56713446332550E-01+I*(-1.18991723734581E-01):c := 2.73408719134080E-01+I*(4.68713256034491E-01):d := -9.61572235181353E-02+I*(-6.77539361917838E-01):e := 1.18529929557954E-02+I*(6.01999441536858E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.81321738683148E-01+I*(-2.97755289135309E-01):b := 3.55429260591261E-01+I*(1.37103570722055E-01):c := 1.08151007894719E-01+I*(1.99715644791298E-01):d := 6.77846568291399E-02+I*(-3.52697627546824E-01):e := -1.08947288410448E-01+I*(9.44169471431874E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.83164299754994E-01+I*(-2.31809719210657E-02):b := 3.37020888303695E-01+I*(4.90026305292257E-01):c := 3.29513499107544E-01+I*(-2.92493422502190E-03):d := 1.00727002199136E-01+I*(-2.82462561499859E-01):e := -2.33990751800680E-01+I*(6.57752787032899E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.84687258693630E-01+I*(2.52618294399820E-01):b := 9.60648960475221E-02+I*(7.48548131339170E-01):c := 6.29341858827499E-01+I*(-1.58675571299359E-02):d := 8.08160725926230E-02+I*(-2.07484448004639E-01):e := -1.55381704591673E-01+I*(5.03385738833507E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.31969117462069E-01+I*(4.00592967948389E-01):b := -2.54692729473033E-01+I*(7.91703813305385E-01):c := 8.67343065320572E-01+I*(1.66943773174996E-01):d := 1.73684132578217E-02+I*(-1.62846379654489E-01):e := -6.40646656967575E-02+I*(4.41021838512812E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.56740497008155E-01+I*(3.51504054415954E-01):b := -5.51128597040117E-01+I*(5.99300327976931E-01):c := 9.32153708979880E-01+I*(4.59969603518471E-01):d := -5.99281108603262E-02+I*(-1.69435004727314E-01):e := 2.12616183853509E-02+I*(4.19131678279858E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.46351147456471E-01+I*(1.28320802006846E-01):b := -6.54537069701400E-01+I*(2.61365404465542E-01):c := 7.93448169347161E-01+I*(7.26099891263429E-01):d := -1.14905597071763E-01+I*(-2.24167432327128E-01):e := 1.07563702819945E-01+I*(4.23813352094219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.48141903250460E-01+I*(-1.64526865071153E-01):b := -5.16532173841507E-01+I*(-6.39774507894744E-02):c := 5.16128309956926E-01+I*(8.40809317065310E-01):d := -1.21839468571459E-01+I*(-3.01433751296802E-01):e := 2.04063594459424E-01+I*(4.63265185559318E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.61274849852081E-01+I*(-3.90012268752962E-01):b := -2.01687933986856E-01+I*(-2.24496700031222E-01):c := 2.29955175084792E-01+I*(7.50424065738154E-01):d := -7.74852898233073E-02+I*(-3.65080192270942E-01):e := 3.07792959047369E-01+I*(5.80728449749799E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.26812841657598E-01+I*(-4.42628282664740E-01):b := 1.42676530930598E-01+I*(-1.45083602566747E-01):c := 6.88323549975570E-02+I*(4.97236400898111E-01):d := -2.59687400535694E-03+I*(-3.85325878166348E-01):e := 2.89349230197393E-01+I*(8.61436248028148E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.99029543655426E-01+I*(-4.43598161636188E-01):b := 2.84843451663925E-01+I*(4.38145156648932E-02):c := -6.68979031531786E-02+I*(9.00664893126723E-02):d := -4.83751640691231E-02+I*(-6.87096786898017E-02):e := -1.30125537775607E+00+I*(1.74785121653757E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.00872104727272E-01+I*(-1.69023844421944E-01):b := 2.66435079376360E-01+I*(3.96737250235095E-01):c := 1.54464588059647E-01+I*(-1.12574089703647E-01):d := -1.54328186991269E-02+I*(1.52538735716374E-03):e := -7.42254693890833E-01+I*(7.87827620345598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.02395063665908E-01+I*(1.06775421898942E-01):b := 2.54790871201870E-02+I*(6.55259076282008E-01):c := 4.54292947779602E-01+I*(-1.25516712608562E-01):d := -3.53437483056402E-02+I*(7.65035008523842E-02):e := -3.96118993339406E-01+I*(6.31210656361249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.49676922434348E-01+I*(2.54750095447510E-01):b := -3.25278538400368E-01+I*(6.98414758248224E-01):c := 6.92294154272675E-01+I*(5.72946176963700E-02):d := -9.87914076404417E-02+I*(1.21141569202534E-01):e := -1.82454551173123E-01+I*(5.91612065591343E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.09673079641230E-02+I*(2.05661181915076E-01):b := -6.21714405967453E-01+I*(5.06011272919770E-01):c := 7.57104797931983E-01+I*(3.50320448039846E-01):d := -1.76087931758590E-01+I*(1.14552944129709E-01):e := -1.12833096944622E-02+I*(5.87102778094037E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28643342484192E-01+I*(-1.75220704940319E-02):b := -7.25122878628734E-01+I*(1.68076349408381E-01):c := 6.18399258299264E-01+I*(6.16450735784803E-01):d := -2.31065417970027E-01+I*(5.98205165298945E-02):e := 1.61223690067536E-01+I*(6.06661092946295E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.30434098278182E-01+I*(-3.10369737572031E-01):b := -5.87117982768842E-01+I*(-1.57266505846636E-01):c := 3.41079398909028E-01+I*(7.31160161586685E-01):d := -2.37999289469722E-01+I*(-1.74458024397794E-02):e := 3.80000055716706E-01+I*(6.68346972643700E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.64329551201967E-02+I*(-5.35855141253840E-01):b := -2.72273742914192E-01+I*(-3.17785755088384E-01):c := 5.49062640368953E-02+I*(6.40774910259528E-01):d := -1.93645110721571E-01+I*(-8.10922434139194E-02):e := 7.37805751014032E-01+I*(8.80535560382167E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.44520646629876E-01+I*(-5.88471155165619E-01):b := 7.20907220032630E-02+I*(-2.38372657623909E-01):c := -1.06216556050340E-01+I*(3.87587245419486E-01):d := -1.18756694903620E-01+I*(-1.01337929309325E-01):e := 1.13986982365405E+00+I*(2.11859070649727E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.59549389282729E-01+I*(-4.15380404115761E-01):b := 2.90736633682191E-01+I*(-7.30207299636586E-02):c := -1.30512030181195E-01+I*(-1.06448908045127E-01):d := -3.19902684207523E-01+I*(7.41716178280659E-02):e := -1.20467811763066E+00+I*(-7.57070747010825E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.61391950354575E-01+I*(-1.40806086901517E-01):b := 2.72328261394625E-01+I*(2.79902004606544E-01):c := 9.08504610316302E-02+I*(-3.09089487061447E-01):d := -2.86960338837526E-01+I*(1.44406683875031E-01):e := -8.06452424217962E-01+I*(1.71555685599864E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.62914909293211E-01+I*(1.34993179419369E-01):b := 3.13722691384530E-02+I*(5.38423830653457E-01):c := 3.90678820751585E-01+I*(-3.22032109966361E-01):d := -3.06871268444039E-01+I*(2.19384797370251E-01):e := -5.98219378848183E-01+I*(3.38573534984565E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.10196768061650E-01+I*(2.82967852967937E-01):b := -3.19385356382102E-01+I*(5.81579512619672E-01):c := 6.28680027244659E-01+I*(-1.39220779661429E-01):d := -3.70318927778841E-01+I*(2.64022865720402E-01):e := -4.43349635071243E-01+I*(4.84128258267876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.21487153591425E-01+I*(2.33878939435502E-01):b := -6.15821223949187E-01+I*(3.89176027291218E-01):c := 6.93490670903966E-01+I*(1.53805050682047E-01):d := -4.47615451896989E-01+I*(2.57434240647576E-01):e := -2.94543432381224E-01+I*(6.45215512282589E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.31876503143110E-01+I*(1.06956870263947E-02):b := -7.19229696610469E-01+I*(5.12411037798296E-02):c := 5.54785131271247E-01+I*(4.19935338427004E-01):d := -5.02592938108426E-01+I*(2.02701813047762E-01):e := -1.12725086437041E-01+I*(8.78745472584713E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.30085747349121E-01+I*(-2.82151980051605E-01):b := -5.81224800750576E-01+I*(-2.74101751475187E-01):c := 2.77465271881012E-01+I*(5.34644764228885E-01):d := -5.09526809608121E-01+I*(1.25435494078088E-01):e := 1.75590283715207E-01+I*(1.38491767916256E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.16952800747499E-01+I*(-5.07637383733413E-01):b := -2.66380560895926E-01+I*(-4.34621000716935E-01):c := -8.70786299112145E-03+I*(4.44259512901729E-01):d := -4.65172630859969E-01+I*(6.17890531039482E-02):e := 1.02875943724169E-01+I*(4.04337760491148E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.05040492257178E-01+I*(-5.60253397645192E-01):b := 7.79839040215287E-02+I*(-3.55207903252460E-01):c := -1.69830683078357E-01+I*(1.91071848061686E-01):d := -3.90284215042019E-01+I*(4.15433672085420E-02):e := -2.74697828755427E+00+I*(-4.17001626505995E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.84538093904279E-01+I*(-2.33538829948356E-01):b := 5.47198426799961E-01+I*(3.32680645192640E-02):c := -5.11944367545790E-01+I*(-2.24970749186326E-01):d := -3.89123481031218E-01+I*(8.01485229283135E-03):e := -1.14804831252444E+00+I*(6.23436742717623E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08638065497612E+00+I*(4.10354872658869E-02):b := 5.28790054512395E-01+I*(3.86190799089466E-01):c := -2.90581876332964E-01+I*(-4.27611328202646E-01):d := -3.56181135661222E-01+I*(7.82499183397967E-02):e := -6.81861939881766E-01+I*(4.42359613550454E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.87903613914761E-01+I*(3.16834753586773E-01):b := 2.87834062256222E-01+I*(6.44712625136379E-01):c := 9.24648338699060E-03+I*(-4.40553951107560E-01):d := -3.76092065267736E-01+I*(1.53228031835017E-01):e := -4.40906411738144E-01+I*(4.49586731226121E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.35185472683200E-01+I*(4.64809427135342E-01):b := -6.29235632643324E-02+I*(6.87868307102595E-01):c := 2.47247689880064E-01+I*(-2.57742620802628E-01):d := -4.39539724602537E-01+I*(1.97866100185167E-01):e := -2.78665040069161E-01+I*(4.90866644625604E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46475858212975E-01+I*(4.15720513602907E-01):b := -3.59359430831417E-01+I*(4.95464821774140E-01):c := 3.12058333539372E-01+I*(3.52832095408479E-02):d := -5.16836248720685E-01+I*(1.91277475112342E-01):e := -1.40253069304435E-01+I*(5.52701401293420E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.56865207764660E-01+I*(1.92537261193800E-01):b := -4.62767903492699E-01+I*(1.57529898262752E-01):c := 1.73352793906653E-01+I*(3.01413497285805E-01):d := -5.71813734932122E-01+I*(1.36545047512528E-01):e := 4.46194115872743E-03+I*(6.50665909876371E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.55074451970671E-01+I*(-1.00310405884200E-01):b := -3.24763007632807E-01+I*(-1.67812956992265E-01):c := -1.03967065483583E-01+I*(4.16122923087687E-01):d := -5.78747606431817E-01+I*(5.92787285428535E-02):e := 1.83402541778543E-01+I*(8.46891391825881E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.41941505369049E-01+I*(-3.25795809566009E-01):b := -9.91876777815615E-03+I*(-3.28332206234013E-01):c := -3.90140200355716E-01+I*(3.25737671760530E-01):d := -5.34393427683666E-01+I*(-4.36771243128654E-03):e := 3.43429084808155E-01+I*(1.42216235798457E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.30029196878728E-01+I*(-3.78411823477788E-01):b := 3.34445697139299E-01+I*(-2.48919108769538E-01):c := -5.51263020442952E-01+I*(7.25500069204876E-02):d := -4.59505011865715E-01+I*(-2.46133983266925E-02):e := -1.16838752465760E+00+I*(2.10431161833793E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00198782396480E+00+I*(2.79230960102237E-02):b := 6.63282022838175E-01+I*(1.87834883700977E-02):c := -3.29460957873842E-01+I*(-3.21742975319295E-01):d := -5.76984348660904E-01+I*(-2.34576477932626E-01):e := -5.63541712977353E-01+I*(3.98809849477801E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10383038503664E+00+I*(3.02497413224467E-01):b := 6.44873650550609E-01+I*(3.71706222940300E-01):c := -1.08098466661016E-01+I*(-5.24383554335614E-01):d := -5.44042003290908E-01+I*(-1.64341411885661E-01):e := -4.19061044278590E-01+I*(3.10132367537799E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00535334397528E+00+I*(5.78296679545353E-01):b := 4.03917658294437E-01+I*(6.30228048987213E-01):c := 1.91729893058939E-01+I*(-5.37326177240529E-01):d := -5.63952932897421E-01+I*(-8.93632983904405E-02):e := -3.11461480541954E-01+I*(3.08322583105219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.52635202743716E-01+I*(7.26271353093922E-01):b := 5.31600327738819E-02+I*(6.73383730953429E-01):c := 4.29731099552012E-01+I*(-3.54514846935597E-01):d := -6.27400592232223E-01+I*(-4.47252300402908E-02):e := -2.32074992076891E-01+I*(3.37323352048929E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.63925588273491E-01+I*(6.77182439561487E-01):b := -2.43275834793203E-01+I*(4.80980245624974E-01):c := 4.94541743211320E-01+I*(-6.14890165921206E-02):d := -7.04697116350371E-01+I*(-5.13138551131159E-02):e := -1.68040778421247E-01+I*(3.87730250842111E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.74314937825176E-01+I*(4.53999187152380E-01):b := -3.46684307454485E-01+I*(1.43045322113586E-01):c := 3.55836203578600E-01+I*(2.04641271152836E-01):d := -7.59674602561808E-01+I*(-1.06046282712930E-01):e := -1.16559751877013E-01+I*(4.68974693134683E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.72524182031187E-01+I*(1.61151520074380E-01):b := -2.08679411594592E-01+I*(-1.82297533141431E-01):c := 7.85163441883651E-02+I*(3.19350696954718E-01):d := -7.66608474061503E-01+I*(-1.83312601682604E-01):e := -1.00984004265084E-01+I*(6.08501642653315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.59391235429565E-01+I*(-6.43338836074287E-02):b := 1.06164828260058E-01+I*(-3.42816782383179E-01):c := -2.07656790683768E-01+I*(2.28965445627561E-01):d := -7.22254295313351E-01+I*(-2.46959042656744E-01):e := -2.47309154667383E-01+I*(8.04359643754832E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.47478926939245E-01+I*(-1.16949897519207E-01):b := 4.50529293177513E-01+I*(-2.63403684918704E-01):c := -3.68779610771004E-01+I*(-2.42222192124815E-02):d := -6.47365879495401E-01+I*(-2.67204728552150E-01):e := -5.91460695971380E-01+I*(6.93996642739517E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.47290606300625E-01+I*(2.39431021753255E-01):b := 7.61517722600763E-01+I*(8.23047565213175E-02):c := -1.27466568013186E-01+I*(-2.78576726686228E-01):d := -5.64959421101835E-01+I*(-5.41166856458005E-01):e := -3.22322395704147E-01+I*(3.87241657987506E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.49133167372471E-01+I*(5.14005338967498E-01):b := 7.43109350313197E-01+I*(4.35227491091520E-01):c := 9.38959231996398E-02+I*(-4.81217305702548E-01):d := -5.32017075731839E-01+I*(-4.70931790411039E-01):e := -2.71420559716807E-01+I*(3.04836683986708E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.50656126311107E-01+I*(7.89804605288384E-01):b := 5.02153358057025E-01+I*(6.93749317138433E-01):c := 3.93724282919595E-01+I*(-4.94159928607461E-01):d := -5.51928005338352E-01+I*(-3.95953676915819E-01):e := -2.08843270736822E-01+I*(2.80333940388783E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.97937985079545E-01+I*(9.37779278836952E-01):b := 1.51395732536469E-01+I*(7.36904999104648E-01):c := 6.31725489412668E-01+I*(-3.11348598302529E-01):d := -6.15375664673153E-01+I*(-3.51315608565669E-01):e := -1.55561280936751E-01+I*(2.85484621508876E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09228370609321E-01+I*(8.88690365304518E-01):b := -1.45040135030615E-01+I*(5.44501513776194E-01):c := 6.96536133071976E-01+I*(-1.83227679590533E-02):d := -6.92672188791301E-01+I*(-3.57904233638494E-01):e := -1.11331691686235E-01+I*(3.09613269377010E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19617720161006E-01+I*(6.65507112895410E-01):b := -2.48448607691897E-01+I*(2.06566590264805E-01):c := 5.57830593439256E-01+I*(2.47807519785904E-01):d := -7.47649675002738E-01+I*(-4.12636661238308E-01):e := -7.69939718413453E-02+I*(3.54036488445911E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.17826964367017E-01+I*(3.72659445817411E-01):b := -1.10443711832005E-01+I*(-1.18776264990212E-01):c := 2.80510734049021E-01+I*(3.62516945587785E-01):d := -7.54583546502434E-01+I*(-4.89902980207982E-01):e := -6.58256139299991E-02+I*(4.26895706794005E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.04694017765396E-01+I*(1.47174042135602E-01):b := 2.04400528022646E-01+I*(-2.79295514231960E-01):c := -5.66240082311248E-03+I*(2.72131694260629E-01):d := -7.10229367754282E-01+I*(-5.53549421182122E-01):e := -1.24047440163042E-01+I*(5.18378829039183E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.92781709275075E-01+I*(9.45580282238234E-02):b := 5.48764992940101E-01+I*(-1.99882416767485E-01):c := -1.66785220910348E-01+I*(1.89440294205857E-02):d := -6.35340951936332E-01+I*(-5.73795107077528E-01):e := -2.69953455856248E-01+I*(5.14873352694626E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.92830988324900E-01+I*(3.02018038176815E-01):b := 7.95939950400617E-01+I*(1.94109561644708E-01):c := -4.76617897205782E-04+I*(-1.15669970761953E-01):d := -3.58675295601083E-01+I*(-7.68299237798767E-01):e := -1.70336838147271E-01+I*(4.01901332909022E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.94673549396746E-01+I*(5.76592355391058E-01):b := 7.77531578113051E-01+I*(5.47032296214910E-01):c := 2.20885873315620E-01+I*(-3.18310549778272E-01):d := -3.25732950231087E-01+I*(-6.98064171751801E-01):e := -1.69462427909646E-01+I*(3.26310947459765E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.96196508335382E-01+I*(8.52391621711944E-01):b := 5.36575585856879E-01+I*(8.05554122261823E-01):c := 5.20714233035575E-01+I*(-3.31253172683186E-01):d := -3.45643879837600E-01+I*(-6.23086058256581E-01):e := -1.32536739908438E-01+I*(2.86086044397701E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.43478367103821E-01+I*(1.00036629526051E+00):b := 1.85817960336324E-01+I*(8.48709804228039E-01):c := 7.58715439528648E-01+I*(-1.48441842378255E-01):d := -4.09091539172401E-01+I*(-5.78447989906431E-01):e := -9.14033352557690E-02+I*(2.73947546692217E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.47687526335963E-02+I*(9.51277381728078E-01):b := -1.10617907230760E-01+I*(6.56306318899584E-01):c := 8.23526083187956E-01+I*(1.44583987965221E-01):d := -4.86388063290549E-01+I*(-5.85036614979256E-01):e := -5.31214655015507E-02+I*(2.80307336515136E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.34841897814719E-01+I*(7.28094129318970E-01):b := -2.14026379892043E-01+I*(3.18371395388196E-01):c := 6.84820543555237E-01+I*(4.10714275710178E-01):d := -5.41365549501986E-01+I*(-6.39769042579071E-01):e := -1.94999186948706E-02+I*(3.03550358988410E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.36632653608708E-01+I*(4.35246462240971E-01):b := -7.60214840321499E-02+I*(-6.97145986682132E-03):c := 4.07500684165001E-01+I*(5.25423701512060E-01):d := -5.48299421001682E-01+I*(-7.17035361548744E-01):e := 2.78362757063272E-03+I*(3.48181042573569E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02343997896703E-02+I*(2.09761058559162E-01):b := 2.38822755822500E-01+I*(-1.67490709108569E-01):c := 1.21327549292868E-01+I*(4.35038450184903E-01):d := -5.03945242253530E-01+I*(-7.80681802522884E-01):e := -1.04842828490415E-02+I*(4.14948084722461E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.38322091299350E-01+I*(1.57145044647384E-01):b := 5.83187220739955E-01+I*(-8.80776116440940E-02):c := -3.97952707943677E-02+I*(1.81850785344861E-01):d := -4.29056826435580E-01+I*(-8.00927488418291E-01):e := -9.15669533662251E-02+I*(4.56177339163982E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.57673453292105E-01+I*(1.86398984719113E-01):b := 7.50442163289738E-01+I*(3.01883192851035E-01):c := -7.91111652125668E-03+I*(9.07514108496416E-02):d := -5.46546070731339E-02+I*(-8.09695856430331E-01):e := -4.26538769890999E-02+I*(4.27720588124262E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.59516014363951E-01+I*(4.60973301933356E-01):b := 7.32033791002172E-01+I*(6.54805927421238E-01):c := 2.13451374691569E-01+I*(-1.11889168166678E-01):d := -2.17122617031375E-02+I*(-7.39460790383366E-01):e := -8.18876814689766E-02+I*(3.63328616016268E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.61038973302587E-01+I*(7.36772568254242E-01):b := 4.91077798746000E-01+I*(9.13327753468151E-01):c := 5.13279734411524E-01+I*(-1.24831791071592E-01):d := -4.16231913096506E-02+I*(-6.64482676888146E-01):e := -6.73004667897482E-02+I*(3.09683705680834E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08320832071026E-01+I*(8.84747241802810E-01):b := 1.40320173225444E-01+I*(9.56483435434366E-01):c := 7.51280940904597E-01+I*(5.79795392333402E-02):d := -1.05070850644452E-01+I*(-6.19844608537995E-01):e := -3.49902380844595E-02+I*(2.82165964765427E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.80388782399198E-01+I*(8.35658328270375E-01):b := -1.56115694341640E-01+I*(7.64079950105911E-01):c := 8.16091584563905E-01+I*(3.51005369576816E-01):d := -1.82367374762600E-01+I*(-6.26433233610820E-01):e := 7.86189251558958E-04+I*(2.74007943907059E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.69999432847514E-01+I*(6.12475075861268E-01):b := -2.59524167002922E-01+I*(4.26145026594523E-01):c := 6.77386044931185E-01+I*(6.17135657321773E-01):d := -2.37344860974037E-01+I*(-6.81165661210635E-01):e := 3.65981723311534E-02+I*(2.82073947484944E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.71790188641503E-01+I*(3.19627408783269E-01):b := -1.21519271143030E-01+I*(1.00802171339506E-01):c := 4.00066185540950E-01+I*(7.31845083123654E-01):d := -2.44278732473733E-01+I*(-7.58431980180308E-01):e := 6.90075484627954E-02+I*(3.09549407064008E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84923135243124E-01+I*(9.41420051014598E-02):b := 1.93324968711621E-01+I*(-5.97170779022418E-02):c := 1.13893050668817E-01+I*(6.41459831796498E-01):d := -1.99924553725581E-01+I*(-8.22078421154449E-01):e := 8.36932024270017E-02+I*(3.63262484862022E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03164556266555E-01+I*(4.15259911896813E-02):b := 5.37689433629076E-01+I*(1.96960195622332E-02):c := -4.72297694184187E-02+I*(3.88272166956455E-01):d := -1.25036137907631E-01+I*(-8.42324107049855E-01):e := 4.44114245467615E-02+I*(4.27747048168328E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.51850825328973E-01+I*(-5.33266985443448E-02):b := 6.46313281508885E-01+I*(3.55197170328367E-01):c := -1.46291379353896E-01+I*(2.44100559574374E-01):d := 2.04847985506196E-01+I*(-6.45986774422821E-01):e := 9.39949574230304E-02+I*(4.69893588507177E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.53693386400819E-01+I*(2.21247618669898E-01):b := 6.27904909221319E-01+I*(7.08119904898569E-01):c := 7.50711118589295E-02+I*(4.14599805580547E-02):d := 2.37790330876192E-01+I*(-5.75751708375855E-01):e := 9.01654780802830E-03+I*(4.25234396403043E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.55216345339455E-01+I*(4.97046884990785E-01):b := 3.86948916965147E-01+I*(9.66641730945483E-01):c := 3.74899471578885E-01+I*(2.85173576531404E-02):d := 2.17879401269679E-01+I*(-5.00773594880635E-01):e := -3.77615109818206E-03+I*(3.55226868778040E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.49820410789394E-03+I*(6.45021558539353E-01):b := 3.61912914445916E-02+I*(1.00979741291170E+00):c := 6.12900678071958E-01+I*(2.11328687958072E-01):d := 1.54431741934878E-01+I*(-4.56135526530485E-01):e := 1.98959471036405E-02+I*(3.09119337114269E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.86211410362331E-01+I*(5.95932645006918E-01):b := -2.60244576122493E-01+I*(8.17393927583243E-01):c := 6.77711321731265E-01+I*(5.04354518301548E-01):d := 7.71352178167300E-02+I*(-4.62724151603310E-01):e := 5.48923016492485E-02+I*(2.85222977896090E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.75822060810646E-01+I*(3.72749392597811E-01):b := -3.63653048783775E-01+I*(4.79459004071855E-01):c := 5.39005782098546E-01+I*(7.70484806046505E-01):d := 2.21577316052927E-02+I*(-5.17456579203124E-01):e := 9.46101140848984E-02+I*(2.78649533790819E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.77612816604635E-01+I*(7.99017255198114E-02):b := -2.25648152923883E-01+I*(1.54116148816838E-01):c := 2.61685922708311E-01+I*(8.85194231848387E-01):d := 1.52238601055972E-02+I*(-5.94722898172798E-01):e := 1.37454638423074E-01+I*(2.91114021645028E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.90745763206257E-01+I*(-1.45583678161997E-01):b := 8.91960869307677E-02+I*(-6.40310042490973E-03):c := -2.44872121638224E-02+I*(7.94808980521230E-01):d := 5.95780388537489E-02+I*(-6.58369339146938E-01):e := 1.76371124478520E-01+I*(3.32938847768056E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65807169657732E-03+I*(-1.98199692073776E-01):b := 4.33560551848222E-01+I*(7.30099970395654E-02):c := -1.85610032251058E-01+I*(5.41621315681188E-01):d := 1.34466454671699E-01+I*(-6.78615025042345E-01):e := 1.77707783038769E-01+I*(4.12659066611172E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.24878688146959E-01+I*(-3.04988700160386E-01):b := 5.32276366106933E-01+I*(3.29105291496201E-01):c := -3.50867743490419E-01+I*(2.72623704437994E-01):d := 2.98408335018974E-01+I*(-3.53773290671331E-01):e := 2.82841278868350E-01+I*(5.55917200087497E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.26721249218805E-01+I*(-3.04143829461426E-02):b := 5.13867993819367E-01+I*(6.82028026066403E-01):c := -1.29505252277594E-01+I*(6.99831254216742E-02):d := 3.31350680388970E-01+I*(-2.83538224624366E-01):e := 1.17076791133938E-01+I*(5.52121672983360E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.28244208157440E-01+I*(2.45384883374744E-01):b := 2.72912001563195E-01+I*(9.40549852113316E-01):c := 1.70323107442361E-01+I*(5.70405025167602E-02):d := 3.11439750782457E-01+I*(-2.08560111129146E-01):e := 5.85900911520150E-02+I*(4.47398818661345E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.55260669258793E-02+I*(3.93359556923312E-01):b := -7.78456239573604E-02+I*(9.83705534079532E-01):c := 4.08324313935435E-01+I*(2.39851832821692E-01):d := 2.47992091447656E-01+I*(-1.63922042778996E-01):e := 7.43890269318609E-02+I*(3.68979643663885E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.13183547544345E-01+I*(3.44270643390877E-01):b := -3.74281491524445E-01+I*(7.91302048751077E-01):c := 4.73134957594742E-01+I*(5.32877663165168E-01):d := 1.70695567329508E-01+I*(-1.70510667851821E-01):e := 1.12932855355876E-01+I*(3.22289951792322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.02794197992660E-01+I*(1.21087390981769E-01):b := -4.77689964185727E-01+I*(4.53367125239689E-01):c := 3.34429417962023E-01+I*(7.99007950910125E-01):d := 1.15718081118071E-01+I*(-2.25243095451635E-01):e := 1.61148378210651E-01+I*(2.97156497025821E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.04584953786649E-01+I*(-1.71760276096230E-01):b := -3.39685068325835E-01+I*(1.28024269984672E-01):c := 5.71095585717876E-02+I*(9.13717376712007E-01):d := 1.08784209618376E-01+I*(-3.02509414421309E-01):e := 2.19035421209648E-01+I*(2.91994455510912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.17717900388271E-01+I*(-3.97245679778039E-01):b := -2.48408284711840E-02+I*(-3.24949792570761E-02):c := -2.29063576300346E-01+I*(8.23332125384850E-01):d := 1.53138388366527E-01+I*(-3.66155855395449E-01):e := 2.87837608495634E-01+I*(3.18817304371109E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.03697911214085E-02+I*(-4.49861693689817E-01):b := 3.19523636446270E-01+I*(4.69181182073991E-02):c := -3.90186396387581E-01+I*(5.70144460544807E-01):d := 2.28026804184477E-01+I*(-3.86401541290855E-01):e := 3.45127497856969E-01+I*(4.11059872768531E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.42586493119237E-01+I*(-4.50831572661265E-01):b := 4.61690557179598E-01+I*(2.35816236439040E-01):c := -5.25916654538317E-01+I*(1.62974548959369E-01):d := 1.82248514120712E-01+I*(-6.97853418143084E-02):e := 6.41419667923149E-01+I*(8.40752200819232E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.44429054191083E-01+I*(-1.76257255447021E-01):b := 4.43282184892032E-01+I*(5.88738971009242E-01):c := -3.04554163325491E-01+I*(-3.96660300569510E-02):d := 2.15190859490708E-01+I*(4.49724232656996E-04):e := 1.84358700567274E-01+I*(9.09464845000513E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.45952013129719E-01+I*(9.95420108738647E-02):b := 2.02326192635859E-01+I*(8.47260797056155E-01):c := -4.72580360553649E-03+I*(-5.26086529618654E-02):d := 1.95279929884195E-01+I*(7.54278377278776E-02):e := 5.76648982385489E-02+I*(6.52650221843575E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.93233871898158E-01+I*(2.47516684422433E-01):b := -1.48431432884696E-01+I*(8.90416479022370E-01):c := 2.33275402887537E-01+I*(1.30202677343066E-01):d := 1.31832270549393E-01+I*(1.20065906078028E-01):e := 9.64655168803901E-02+I*(5.00283710561628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52425742793361E-03+I*(1.98427770889999E-01):b := -4.44867300451780E-01+I*(6.98012993693916E-01):c := 2.98086046546845E-01+I*(4.23228507686542E-01):d := 5.45357464312449E-02+I*(1.13477281005203E-01):e := 1.62428004668268E-01+I*(4.15859652067444E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.85086393020382E-01+I*(-2.47554815191089E-02):b := -5.48275773113062E-01+I*(3.60078070182527E-01):c := 1.59380506914126E-01+I*(6.89358795431499E-01):d := -4.41739780192399E-04+I*(5.87448534053880E-02):e := 2.38082974714505E-01+I*(3.64354032360159E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86877148814371E-01+I*(-3.17603148597108E-01):b := -4.10270877253170E-01+I*(3.47352149275103E-02):c := -1.17939352476110E-01+I*(8.04068221233381E-01):d := -7.37561127988779E-03+I*(-1.85214655642861E-02):e := 3.30116158028357E-01+I*(3.35413730419572E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.00954159928520E-05+I*(-5.43088552278917E-01):b := -9.54266373985191E-02+I*(-1.25784034314237E-01):c := -4.04112487348243E-01+I*(7.13682969906225E-01):d := 3.69785674682640E-02+I*(-8.21679065384263E-02):e := 4.56234291560237E-01+I*(3.40853064570941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.88077596093686E-01+I*(-5.95704566190695E-01):b := 2.48937827518935E-01+I*(-4.63709368497623E-02):c := -5.65235307435479E-01+I*(4.60495305066182E-01):d := 1.11866983286215E-01+I*(-1.02413592433832E-01):e := 6.31817076496990E-01+I*(4.53503410563167E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.03106338746539E-01+I*(-4.22613815140838E-01):b := 4.67583739197863E-01+I*(1.18980990810488E-01):c := -5.89530781566333E-01+I*(-3.35408483984311E-02):d := -8.92790060176876E-02+I*(7.30959547035590E-02):e := 1.88178790975070E-01+I*(3.00245186585984E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.04948899818385E-01+I*(-1.48039497926594E-01):b := 4.49175366910297E-01+I*(4.71903725380690E-01):c := -3.68168290353508E-01+I*(-2.36181427414751E-01):d := -5.63366606476914E-02+I*(1.43331020750524E-01):e := -6.52188730934846E-01+I*(1.22485767010333E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.06471858757021E-01+I*(1.27759768394291E-01):b := 2.08219374654125E-01+I*(7.30425551427603E-01):c := -6.83399306335529E-02+I*(-2.49124050319665E-01):d := -7.62475902542046E-02+I*(2.18309134245745E-01):e := -3.01975101729987E-01+I*(7.94014406890508E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.53753717525460E-01+I*(2.75734441942860E-01):b := -1.42538250866430E-01+I*(7.73581233393818E-01):c := 1.69661275859520E-01+I*(-6.63127200147331E-02):d := -1.39695249589006E-01+I*(2.62947202595895E-01):e := -7.86239623112548E-02+I*(6.54054427248562E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.65044103055236E-01+I*(2.26645528410425E-01):b := -4.38974118433515E-01+I*(5.81177748065364E-01):c := 2.34471919518828E-01+I*(2.26713110328743E-01):d := -2.16991773707154E-01+I*(2.56358577523070E-01):e := 9.21245794141625E-02+I*(5.85638830494664E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.54334526069204E-02+I*(3.46227600131791E-03):b := -5.42382591094797E-01+I*(2.43242824553976E-01):c := 9.57663798861091E-02+I*(4.92843398073700E-01):d := -2.71969259918591E-01+I*(2.01626149923255E-01):e := 2.55493231715495E-01+I*(5.45560053686588E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.36426968129313E-02+I*(-2.89385391076681E-01):b := -4.04377695234904E-01+I*(-8.21000307010412E-02):c := -1.81553479504126E-01+I*(6.07552823875581E-01):d := -2.78903131418287E-01+I*(1.24359830953581E-01):e := 4.51490704964962E-01+I*(5.26906645953716E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.60509750211309E-01+I*(-5.14870794758490E-01):b := -8.95334553802536E-02+I*(-2.42619279942789E-01):c := -4.67726614376260E-01+I*(5.17167572548425E-01):d := -2.34548952670135E-01+I*(6.07133899794413E-02):e := 7.57569864667017E-01+I*(5.59698361347692E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.48597441720989E-01+I*(-5.67486808670269E-01):b := 2.54831009537201E-01+I*(-1.63206182478314E-01):c := -6.28849434463495E-01+I*(2.63979907708383E-01):d := -1.59660536852185E-01+I*(4.04677040840353E-02):e := 1.40286756325984E+00+I*(9.40503298638183E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.45949755671037E-01+I*(-2.75360837806486E-01):b := 5.59254842109801E-01+I*(2.94025044021983E-01):c := -9.10437528718970E-01+I*(-4.64171501239541E-01):d := -2.11764070973607E-01+I*(1.55432889374396E-01):e := 3.54739552777521E+00+I*(1.81735031439590E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04779231674288E+00+I*(-7.86520592242198E-04):b := 5.40846469822235E-01+I*(6.46947778592185E-01):c := -6.89075037506145E-01+I*(-6.66812080255860E-01):d := -1.78821725603611E-01+I*(2.25667955421362E-01):e := -7.02468917576470E-01+I*(2.15975790649569E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.49315275681518E-01+I*(2.75012745728644E-01):b := 2.99890477566063E-01+I*(9.05469604639098E-01):c := -3.89246677786189E-01+I*(-6.79754703160774E-01):d := -1.98732655210124E-01+I*(3.00646068916582E-01):e := -2.61388493421657E-01+I*(1.06867796956573E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.96597134449958E-01+I*(4.22987419277212E-01):b := -5.08671479544920E-02+I*(9.48625286605313E-01):c := -1.51245471293116E-01+I*(-4.96943372855843E-01):d := -2.62180314544925E-01+I*(3.45284137266732E-01):e := 1.28156967621731E-02+I*(7.75113081750017E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.07887519979733E-01+I*(3.73898505744778E-01):b := -3.47303015521577E-01+I*(7.56221801276859E-01):c := -8.64348276338079E-02+I*(-2.03917542512366E-01):d := -3.39476838663073E-01+I*(3.38695512193907E-01):e := 2.00673615915512E-01+I*(6.25811425215834E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.18276869531418E-01+I*(1.50715253335670E-01):b := -4.50711488182859E-01+I*(4.18286877765471E-01):c := -2.25140367266527E-01+I*(6.22127452325908E-02):d := -3.94454324874510E-01+I*(2.83963084594092E-01):e := 3.66215026431505E-01+I*(5.19491384214811E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.16486113737429E-01+I*(-1.42132413742330E-01):b := -3.12706592322966E-01+I*(9.29440225104533E-02):c := -5.02460226656763E-01+I*(1.76922171034473E-01):d := -4.01388196374206E-01+I*(2.06696765624419E-01):e := 5.51036807165629E-01+I*(4.23826477436549E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.03353167135807E-01+I*(-3.67617817424138E-01):b := 2.13764753168441E-03+I*(-6.75752267312945E-02):c := -7.88633361528897E-01+I*(8.65369197073161E-02):d := -3.57034017626054E-01+I*(1.43050324650279E-01):e := 8.20832803846576E-01+I*(3.21300078918182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.91440858645486E-01+I*(-4.20233831335917E-01):b := 3.46502112449139E-01+I*(1.18378707331807E-02):c := -9.49756181616132E-01+I*(-1.66650745132727E-01):d := -2.82145601808104E-01+I*(1.22804638754873E-01):e := 1.40357874528397E+00+I*(2.27103996441239E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.63399485731553E-01+I*(-1.38989118479057E-02):b := 6.75338438148016E-01+I*(2.79540467872817E-01):c := -7.27954119047022E-01+I*(-5.60943727372509E-01):d := -3.99624938603292E-01+I*(-8.71584408510613E-02):e := -6.73495912607195E-01+I*(1.37773255845833E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06524204680340E+00+I*(2.60675405366338E-01):b := 6.56930065860450E-01+I*(6.32463202443019E-01):c := -5.06591627834196E-01+I*(-7.63584306388829E-01):d := -3.66682593233296E-01+I*(-1.69233748040960E-02):e := -5.33981946945622E-01+I*(7.35958784652609E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.66765005742035E-01+I*(5.36474671687224E-01):b := 4.15974073604277E-01+I*(8.90985028489932E-01):c := -2.06763268114241E-01+I*(-7.76526929293743E-01):d := -3.86593522839810E-01+I*(5.80547386911244E-02):e := -3.07362813116206E-01+I*(5.73681714698094E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.14046864510474E-01+I*(6.84449345235792E-01):b := 6.52164480837223E-02+I*(9.34140710456148E-01):c := 3.12379383788322E-02+I*(-5.93715598988812E-01):d := -4.50041182174611E-01+I*(1.02692807041275E-01):e := -1.46195159934259E-01+I*(5.27250752484676E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.25337250040249E-01+I*(6.35360431703358E-01):b := -2.31219419483362E-01+I*(7.41737225127693E-01):c := 9.60485820381399E-02+I*(-3.00689768645335E-01):d := -5.27337706292759E-01+I*(9.61041819684493E-02):e := -1.22102809785193E-02+I*(5.20443657881959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.35726599591934E-01+I*(4.12177179294250E-01):b := -3.34627892144644E-01+I*(4.03802301616304E-01):c := -4.26569575945793E-02+I*(-3.45594809003780E-02):d := -5.82315192504196E-01+I*(4.13717543686348E-02):e := 1.22261024154761E-01+I*(5.41427685524519E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.33935843797945E-01+I*(1.19329512216251E-01):b := -1.96622996284752E-01+I*(7.84594463612874E-02):c := -3.19976816984815E-01+I*(8.01499449015037E-02):d := -5.89249064003892E-01+I*(-3.58945646010392E-02):e := 2.84560368686668E-01+I*(6.08534351606221E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.20802897196323E-01+I*(-1.06155891465558E-01):b := 1.18221243569899E-01+I*(-8.20598028804605E-02):c := -6.06149951856949E-01+I*(-1.02353064256526E-02):d := -5.44894885255740E-01+I*(-9.95410055751792E-02):e := 5.05272552052103E-01+I*(8.17836716370759E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.08890588706003E-01+I*(-1.58771905377337E-01):b := 4.62585708487354E-01+I*(-2.64670541598524E-03):c := -7.67272771944184E-01+I*(-2.63422971265696E-01):d := -4.70006469437789E-01+I*(-1.19786691470585E-01):e := 4.92461416110856E-01+I*(1.55724185668018E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.08702268067383E-01+I*(1.97609013895125E-01):b := 7.73574137910603E-01+I*(3.43061736024036E-01):c := -5.25959729186366E-01+I*(-5.17777478739442E-01):d := -3.87600011044223E-01+I*(-3.93748819376439E-01):e := -2.11857288067737E-01+I*(7.22437566998184E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.10544829139229E-01+I*(4.72183331109369E-01):b := 7.55165765623037E-01+I*(6.95984470594238E-01):c := -3.04597237973540E-01+I*(-7.20418057755762E-01):d := -3.54657665674227E-01+I*(-3.23513753329474E-01):e := -2.41948539138740E-01+I*(5.20983329949539E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.12067788077864E-01+I*(7.47982597430255E-01):b := 5.14209773366864E-01+I*(9.54506296641152E-01):c := -4.76887825358508E-03+I*(-7.33360680660676E-01):d := -3.74568595280740E-01+I*(-2.48535639834254E-01):e := -1.68142735459047E-01+I*(4.22539627168057E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.59349646846304E-01+I*(8.95957270978823E-01):b := 1.63452147846310E-01+I*(9.97661978607367E-01):c := 2.33232328239488E-01+I*(-5.50549350355744E-01):d := -4.38016254615542E-01+I*(-2.03897571484104E-01):e := -9.08993211891456E-02+I*(3.86805449674750E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70640032376079E-01+I*(8.46868357446388E-01):b := -1.32983719720775E-01+I*(8.05258493278912E-01):c := 2.98042971898796E-01+I*(-2.57523520012268E-01):d := -5.15312778733689E-01+I*(-2.10486196556929E-01):e := -1.94063818290236E-02+I*(3.82283337743911E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.10293819277640E-02+I*(6.23685105037281E-01):b := -2.36392192382057E-01+I*(4.67323569767524E-01):c := 1.59337432266077E-01+I*(8.60676773268915E-03):d := -5.70290264945127E-01+I*(-2.65218624156743E-01):e := 5.09006100586719E-02+I*(4.02372473374896E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.92386261337749E-02+I*(3.30837437959281E-01):b := -9.83872965221642E-02+I*(1.41980714512507E-01):c := -1.17982427124159E-01+I*(1.23316193534571E-01):d := -5.77224136444822E-01+I*(-3.42484943126417E-01):e := 1.22189606089575E-01+I*(4.58293341458839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.66105679532153E-01+I*(1.05352034277473E-01):b := 2.16456943332486E-01+I*(-1.85385347292409E-02):c := -4.04155561996293E-01+I*(3.29309422074142E-02):d := -5.32869957696671E-01+I*(-4.06131384100557E-01):e := 1.70914166654089E-01+I*(5.85553641072587E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54193371041833E-01+I*(5.27360203656942E-02):b := 5.60821408249941E-01+I*(6.08745627352344E-02):c := -5.65278382083528E-01+I*(-2.20256722632629E-01):d := -4.57981541878720E-01+I*(-4.26377069995963E-01):e := 5.96865453492869E-02+I*(7.81273002273242E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54242650091657E-01+I*(2.60196030318685E-01):b := 8.07996365710458E-01+I*(4.54866541147427E-01):c := -3.98969779070386E-01+I*(-3.54870722815167E-01):d := -1.81315885543471E-01+I*(-6.20881200717201E-01):e := 5.78019743781692E-04+I*(5.38100582251915E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.56085211163504E-01+I*(5.34770347532929E-01):b := 7.89587993422892E-01+I*(8.07789275717628E-01):c := -1.77607287857560E-01+I*(-5.57511301831486E-01):d := -1.48373540173475E-01+I*(-5.50646134670236E-01):e := -7.43969151297062E-02+I*(4.50085122964115E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.57608170102139E-01+I*(8.10569613853815E-01):b := 5.48632001166719E-01+I*(1.06631110176454E+00):c := 1.22221071862395E-01+I*(-5.70453924736401E-01):d := -1.68284469779988E-01+I*(-4.75668021175016E-01):e := -6.16552662375143E-02+I*(3.70413141458669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.04890028870579E-01+I*(9.58544287402383E-01):b := 1.97874375646164E-01+I*(1.10946678373076E+00):c := 3.60222278355468E-01+I*(-3.87642594431469E-01):d := -2.31732129114790E-01+I*(-4.31029952824866E-01):e := -2.16330305354923E-02+I*(3.28196469613766E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61804144003542E-02+I*(9.09455373869949E-01):b := -9.85614919209202E-02+I*(9.17063298402303E-01):c := 4.25032922014776E-01+I*(-9.46167640879929E-02):d := -3.09028653232937E-01+I*(-4.37618577897691E-01):e := 2.37295268209612E-02+I*(3.11383358091309E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.73430236047961E-01+I*(6.86272121460841E-01):b := -2.01969964582203E-01+I*(5.79128374890914E-01):c := 2.86327382382057E-01+I*(1.71513523656964E-01):d := -3.64006139444375E-01+I*(-4.92351005497505E-01):e := 7.10072457928073E-02+I*(3.13984497945850E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.75220991841950E-01+I*(3.93424454382841E-01):b := -6.39650687223097E-02+I*(2.53785519635897E-01):c := 9.00752299182108E-03+I*(2.86222949458846E-01):d := -3.70940010944070E-01+I*(-5.69617324467179E-01):e := 1.19124561586130E-01+I*(3.39769847836836E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.16460615564282E-02+I*(1.67939050701033E-01):b := 2.50879171132341E-01+I*(9.32662703941494E-02):c := -2.77165611880312E-01+I*(1.95837698131689E-01):d := -3.26585832195918E-01+I*(-6.33263765441319E-01):e := 1.56030859284006E-01+I*(4.03102484047061E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.99733753066107E-01+I*(1.15323036789254E-01):b := 5.95243636049796E-01+I*(1.72679367858625E-01):c := -4.38288431967548E-01+I*(-5.73499667083534E-02):d := -2.51697416377968E-01+I*(-6.53509451336725E-01):e := 1.28891624350633E-01+I*(5.05855603271477E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.19085115058863E-01+I*(1.44576976860983E-01):b := 7.62498578599578E-01+I*(5.62640172353754E-01):c := -4.06404277694437E-01+I*(-1.48449341203573E-01):d := 1.22704802984478E-01+I*(-6.62277819348766E-01):e := 1.41431943220247E-01+I*(4.38908402691837E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.20927676130709E-01+I*(4.19151294075226E-01):b := 7.44090206312012E-01+I*(9.15562906923956E-01):c := -1.85041786481611E-01+I*(-3.51089920219892E-01):d := 1.55647148354474E-01+I*(-5.92042753301801E-01):e := 5.35945778046186E-02+I*(4.15313105815888E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.22450635069345E-01+I*(6.94950560396112E-01):b := 5.03134214055840E-01+I*(1.17408473297087E+00):c := 1.14786573238344E-01+I*(-3.64032543124806E-01):d := 1.35736218747961E-01+I*(-5.17064639806580E-01):e := 2.79728927256585E-02+I*(3.50804709483220E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.97324938377842E-02+I*(8.42925233944681E-01):b := 1.52376588535285E-01+I*(1.21724041493708E+00):c := 3.52787779731417E-01+I*(-1.81221212819875E-01):d := 7.22885594131595E-02+I*(-4.72426571456430E-01):e := 4.32502559732966E-02+I*(3.02511380213905E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.18977120632440E-01+I*(7.93836320412246E-01):b := -1.44059279031800E-01+I*(1.02483692960863E+00):c := 4.17598423390725E-01+I*(1.11804617523602E-01):d := -5.00796470498847E-03+I*(-4.79015196529255E-01):e := 7.32646148205741E-02+I*(2.74698199229732E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.08587771080755E-01+I*(5.70653068003139E-01):b := -2.47467751693082E-01+I*(6.86902006097242E-01):c := 2.78892883758006E-01+I*(3.77934905268558E-01):d := -5.99854509164258E-02+I*(-5.33747624129070E-01):e := 1.09736347619911E-01+I*(2.63334295962052E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.10378526874745E-01+I*(2.77805400925139E-01):b := -1.09462855833189E-01+I*(3.61559150842224E-01):c := 1.57302436777035E-03+I*(4.92644331070440E-01):d := -6.69193224161211E-02+I*(-6.11013943098744E-01):e := 1.50773342958410E-01+I*(2.69388609319098E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.23511473476366E-01+I*(5.23199972433307E-02):b := 2.05381384021462E-01+I*(2.01039901600477E-01):c := -2.84600110504363E-01+I*(4.02259079743284E-01):d := -2.25651436679694E-02+I*(-6.74660384072884E-01):e := 1.91362210272243E-01+I*(3.01837338712741E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.45762180333126E-02+I*(-2.96016668447812E-04):b := 5.49745848938916E-01+I*(2.80452999064952E-01):c := -4.45722930591599E-01+I*(1.49071414903241E-01):d := 5.23232721499811E-02+I*(-6.94906069968290E-01):e := 2.04977847053304E-01+I*(3.72028435533412E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13262487095731E-01+I*(-9.51487064024743E-02):b := 6.58369696818725E-01+I*(6.15954149831086E-01):c := -5.44784540527076E-01+I*(4.89980752115997E-03):d := 3.82207395563808E-01+I*(-4.98568737341256E-01):e := 2.64919477763589E-01+I*(3.64384069643168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.15105048167577E-01+I*(1.79425610811769E-01):b := 6.39961324531159E-01+I*(9.68876884401288E-01):c := -3.23422049314251E-01+I*(-1.97740771495160E-01):d := 4.15149740933804E-01+I*(-4.28333671294290E-01):e := 1.78345008414210E-01+I*(3.95924740685147E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.16628007106213E-01+I*(4.55224877132655E-01):b := 3.99005332274986E-01+I*(1.22739871044820E+00):c := -2.35936895942959E-02+I*(-2.10683394400074E-01):d := 3.95238811327291E-01+I*(-3.53355557799069E-01):e := 1.18254892311852E-01+I*(3.50087763941319E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.60901341253479E-02+I*(6.03199550681223E-01):b := 4.82477067544315E-02+I*(1.27055439241442E+00):c := 2.14407516898778E-01+I*(-2.78720640951422E-02):d := 3.31791151992489E-01+I*(-3.08717489448919E-01):e := 1.09863284679307E-01+I*(2.95812155262148E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.24799748595572E-01+I*(5.54110637148789E-01):b := -2.48188160812653E-01+I*(1.07815090708596E+00):c := 2.79218160558086E-01+I*(2.65153766248334E-01):d := 2.54494627874341E-01+I*(-3.15306114521745E-01):e := 1.26892875283101E-01+I*(2.56794783074365E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.14410399043888E-01+I*(3.30927384739681E-01):b := -3.51596633473935E-01+I*(7.40215983574573E-01):c := 1.40512620925366E-01+I*(5.31284053993291E-01):d := 1.99517141662904E-01+I*(-3.70038542121559E-01):e := 1.55880624015486E-01+I*(2.32576958518025E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.16201154837877E-01+I*(3.80797176616821E-02):b := -2.13591737614042E-01+I*(4.14873128319556E-01):c := -1.36807238464869E-01+I*(6.45993479795173E-01):d := 1.92583270163209E-01+I*(-4.47304861091233E-01):e := 1.93548503395021E-01+I*(2.22790803713502E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.29334101439499E-01+I*(-1.87405686020127E-01):b := 1.01252502240608E-01+I*(2.54353879077809E-01):c := -4.22980373337002E-01+I*(5.55608228468016E-01):d := 2.36937448911360E-01+I*(-5.10951302065374E-01):e := 2.38670671426728E-01+I*(2.33768030946200E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.12464099298196E-02+I*(-2.40021699931905E-01):b := 4.45616967158063E-01+I*(3.33766976542284E-01):c := -5.84103193424238E-01+I*(3.02420563627974E-01):d := 3.11825864729311E-01+I*(-5.31196987960780E-01):e := 2.78801279626148E-01+I*(2.81473234813269E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.86290349913717E-01+I*(-3.46810708018515E-01):b := 5.44332781416774E-01+I*(5.89862270998920E-01):c := -7.49360904663600E-01+I*(3.34229523847793E-02):d := 4.75767745076586E-01+I*(-2.06355253589766E-01):e := 4.03541376093567E-01+I*(2.92908941387935E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.88132910985563E-01+I*(-7.22363908042719E-02):b := 5.25924409129208E-01+I*(9.42785005569121E-01):c := -5.27998413450774E-01+I*(-1.69217626631540E-01):d := 5.08710090446582E-01+I*(-1.36120187542801E-01):e := 3.33040725573866E-01+I*(3.90728640815208E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.89655869924198E-01+I*(2.03562875516614E-01):b := 2.84968416873035E-01+I*(1.20130683161603E+00):c := -2.28170053730819E-01+I*(-1.82160249536454E-01):d := 4.88799160840069E-01+I*(-6.11420740475807E-02):e := 2.28066261850322E-01+I*(3.75035261005437E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69377286926373E-02+I*(3.51537549065183E-01):b := -6.57892086475199E-02+I*(1.24446251358225E+00):c := 9.83115276225497E-03+I*(6.51080768477655E-04):d := 4.25351501505268E-01+I*(-1.65040056974307E-02):e := 1.88017476946051E-01+I*(3.11385853139694E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.51771885777587E-01+I*(3.02448635532748E-01):b := -3.62225076214604E-01+I*(1.05205902825380E+00):c := 7.46417964215628E-02+I*(2.93676911111954E-01):d := 3.48054977387120E-01+I*(-2.30926307702558E-02):e := 1.90454798436289E-01+I*(2.56680994272142E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.41382536225902E-01+I*(7.92653831236400E-02):b := -4.65633548875887E-01+I*(7.14124104742407E-01):c := -6.40637432111567E-02+I*(5.59807198856911E-01):d := 2.93077491175683E-01+I*(-7.78250583700700E-02):e := 2.12768647304205E-01+I*(2.16769173347825E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.43173292019891E-01+I*(-2.13582283954360E-01):b := -3.27628653015994E-01+I*(3.88781249487390E-01):c := -3.41383602601392E-01+I*(6.74516624658793E-01):d := 2.86143619675988E-01+I*(-1.55091377339744E-01):e := 2.48590658067693E-01+I*(1.89937275710797E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.56306238621513E-01+I*(-4.39067687636168E-01):b := -1.27844131613435E-02+I*(2.28262000245642E-01):c := -6.27556737473526E-01+I*(5.84131373331636E-01):d := 3.30497798424139E-01+I*(-2.18737818313884E-01):e := 2.98998137417840E-01+I*(1.79824226693065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.17814528881664E-02+I*(-4.91683701547947E-01):b := 3.31580051756111E-01+I*(3.07675097710117E-01):c := -7.88679557560761E-01+I*(3.30943708491593E-01):d := 4.05386214242089E-01+I*(-2.38983504209290E-01):e := 3.63053527553447E-01+I*(2.03891288074540E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.03998154885994E-01+I*(-4.92653580519394E-01):b := 4.73746972489438E-01+I*(4.96573215941758E-01):c := -9.24409815711497E-01+I*(-7.62262030938455E-02):d := 3.59607924178323E-01+I*(7.76326952672565E-02):e := 6.09646022145345E-01+I*(2.07811747289758E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.05840715957841E-01+I*(-2.18079263305151E-01):b := 4.55338600201872E-01+I*(8.49495950511960E-01):c := -7.03047324498671E-01+I*(-2.78866782110165E-01):d := 3.92550269548320E-01+I*(1.47867761314222E-01):e := 5.90248626670318E-01+I*(4.28173576997983E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07363674896477E-01+I*(5.77200030157351E-02):b := 2.14382607945700E-01+I*(1.10801777655887E+00):c := -4.03218964778717E-01+I*(-2.91809405015080E-01):d := 3.72639339941806E-01+I*(2.22845874809443E-01):e := 3.85444182538931E-01+I*(4.74912652957576E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.54645533664916E-01+I*(2.05694676564304E-01):b := -1.36375017574855E-01+I*(1.15117345852509E+00):c := -1.65217758285643E-01+I*(-1.08998074710148E-01):d := 3.09191680607005E-01+I*(2.67483943159593E-01):e := 2.86990883328619E-01+I*(3.79533086187015E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.40640808053084E-02+I*(1.56605763031869E-01):b := -4.32810885141940E-01+I*(9.58769973196634E-01):c := -1.00407114626335E-01+I*(1.84027755633328E-01):d := 2.31895156488857E-01+I*(2.60895318086767E-01):e := 2.71737516424358E-01+I*(2.91528212474907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.23674731253624E-01+I*(-6.65774893772380E-02):b := -5.36219357803222E-01+I*(6.20835049685246E-01):c := -2.39112654259054E-01+I*(4.50158043378285E-01):d := 1.76917670277419E-01+I*(2.06162890486953E-01):e := 2.89681606823734E-01+I*(2.25050132283274E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25465487047613E-01+I*(-3.59425156455237E-01):b := -3.98214461943329E-01+I*(2.95492194430229E-01):c := -5.16432513649290E-01+I*(5.64867469180167E-01):d := 1.69983798777724E-01+I*(1.28896571517279E-01):e := 3.27283257947325E-01+I*(1.73281551039421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.85984336492350E-02+I*(-5.84910560137046E-01):b := -8.33702220886787E-02+I*(1.34972945188481E-01):c := -8.02605648521423E-01+I*(4.74482217853011E-01):d := 2.14337977525876E-01+I*(6.52501305431384E-02):e := 3.87501458272493E-01+I*(1.34635108789332E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.49489257860444E-01+I*(-6.37526574048825E-01):b := 2.60994242828776E-01+I*(2.14386042652957E-01):c := -9.63728468608659E-01+I*(2.21294553012968E-01):d := 2.89226393343827E-01+I*(4.50044446477325E-02):e := 4.83374705433744E-01+I*(1.24265467151729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.64518000513297E-01+I*(-4.64435822998967E-01):b := 4.79640154507704E-01+I*(3.79737970313206E-01):c := -9.88023942739514E-01+I*(-2.72741600451645E-01):d := 8.80804040399240E-02+I*(2.20513991785124E-01):e := 1.08237576072128E+00+I*(9.54692483470744E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.66360561585143E-01+I*(-1.89861505784724E-01):b := 4.61231782220138E-01+I*(7.32660704883409E-01):c := -7.66661451526688E-01+I*(-4.75382179467965E-01):d := 1.21022749409920E-01+I*(2.90749057832089E-01):e := 1.21430487153461E+00+I*(8.39316293491676E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.67883520523779E-01+I*(8.59377605361622E-02):b := 2.20275789963965E-01+I*(9.91182530930322E-01):c := -4.66833091806733E-01+I*(-4.88324802372880E-01):d := 1.01111819803407E-01+I*(3.65727171327310E-01):e := 5.02927361160557E-01+I*(8.94583344704040E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.15165379292218E-01+I*(2.33912434084731E-01):b := -1.30481835556589E-01+I*(1.03433821289654E+00):c := -2.28831885313659E-01+I*(-3.05513472067948E-01):d := 3.76641604686055E-02+I*(4.10365239677460E-01):e := 3.42155253081693E-01+I*(6.01337165133912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.26455764821994E-01+I*(1.84823520552296E-01):b := -4.26917703123674E-01+I*(8.41934727568083E-01):c := -1.64021241654351E-01+I*(-1.24876417244714E-02):d := -3.96323636495423E-02+I*(4.03776614604635E-01):e := 3.46261621103092E-01+I*(4.23198606669452E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.68451143736782E-02+I*(-3.83597318568114E-02):b := -5.30326175784956E-01+I*(5.03999804056695E-01):c := -3.02726781287071E-01+I*(2.53642646020486E-01):d := -9.46098498609794E-02+I*(3.49044187004820E-01):e := 3.87554122510873E-01+I*(3.03359119862683E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.50543585796892E-02+I*(-3.31207398934811E-01):b := -3.92321279925063E-01+I*(1.78656948801677E-01):c := -5.80046640677306E-01+I*(3.68352071822368E-01):d := -1.01543721360675E-01+I*(2.71777868035146E-01):e := 4.50111673762893E-01+I*(2.07042794463077E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.21921411978068E-01+I*(-5.56692802616620E-01):b := -7.74770400704130E-02+I*(1.81376995599296E-02):c := -8.66219775549440E-01+I*(2.77966820495211E-01):d := -5.71895426125232E-02+I*(2.08131427061006E-01):e := 5.45734401673171E-01+I*(1.18504450309526E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.10009103487747E-01+I*(-6.09308816528398E-01):b := 2.66887424847041E-01+I*(9.75507970244050E-02):c := -1.02734259563668E+00+I*(2.47791556551682E-02):d := 1.76988732054272E-02+I*(1.87885741165600E-01):e := 7.18271177260161E-01+I*(4.07880828500354E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.43272042061684E-01+I*(-3.32202460221006E-01):b := 4.00879236498204E-01+I*(5.01526193552930E-01):c := -1.06194572080909E+00+I*(-9.03556374686727E-01):d := -1.70657368144454E-01+I*(3.82366088742584E-01):e := 7.57912630341426E-01+I*(-6.62056334489628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04511460313353E+00+I*(-5.76281430067623E-02):b := 3.82470864210638E-01+I*(8.54448928123132E-01):c := -8.40583229596267E-01+I*(-1.10619695370305E+00):d := -1.37715022774457E-01+I*(4.52601154789549E-01):e := 1.42287275098218E+00+I*(-1.27837798056563E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.46637562072167E-01+I*(2.18171123314124E-01):b := 1.41514871954466E-01+I*(1.11297075417005E+00):c := -5.40754869876311E-01+I*(-1.11913957660796E+00):d := -1.57625952380971E-01+I*(5.27579268284770E-01):e := 2.84285344058362E+00+I*(1.05575403437114E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.93919420840606E-01+I*(3.66145796862692E-01):b := -2.09242753566089E-01+I*(1.15612643613626E+00):c := -3.02753663383238E-01+I*(-9.36328246303029E-01):d := -2.21073611715772E-01+I*(5.72217336634920E-01):e := 9.57438940750895E-01+I*(9.14093184392086E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.05209806370381E-01+I*(3.17056883330258E-01):b := -5.05678621133173E-01+I*(9.63722950807806E-01):c := -2.37943019723930E-01+I*(-6.43302415959553E-01):d := -2.98370135833920E-01+I*(5.65628711562094E-01):e := 6.85849833048314E-01+I*(4.71804228695033E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.15599155922066E-01+I*(9.38736309211502E-02):b := -6.09087093794455E-01+I*(6.25788027296418E-01):c := -3.76648559356649E-01+I*(-3.77172128214596E-01):d := -3.53347622045357E-01+I*(5.10896283962280E-01):e := 6.17713132757501E-01+I*(2.23426256862652E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13808400128077E-01+I*(-1.98974036156849E-01):b := -4.71082197934563E-01+I*(3.00445172041401E-01):c := -6.53968418746885E-01+I*(-2.62462702412714E-01):d := -3.60281493545053E-01+I*(4.33629964992606E-01):e := 5.97935253959628E-01+I*(3.90943638154595E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.00675453526455E-01+I*(-4.24459439838658E-01):b := -1.56237958079912E-01+I*(1.39925922799653E-01):c := -9.40141553619018E-01+I*(-3.52847953739870E-01):d := -3.15927314796901E-01+I*(3.69983524018466E-01):e := 6.02047045326851E-01+I*(-1.34990904584081E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.88763145036134E-01+I*(-4.77075453750436E-01):b := 1.88126506837542E-01+I*(2.19339020264128E-01):c := -1.10126437370625E+00+I*(-6.06035618579914E-01):d := -2.41038898978950E-01+I*(3.49737838123060E-01):e := 6.36114486359525E-01+I*(-3.42103321448639E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.60721772122201E-01+I*(-7.07405342624254E-02):b := 5.16962832536419E-01+I*(4.87041617403764E-01):c := -8.79462311137144E-01+I*(-1.00032860081970E+00):d := -3.58518235774139E-01+I*(1.39774758517126E-01):e := 2.64623449402622E+00+I*(-2.02079456616727E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06256433319405E+00+I*(2.03833782951818E-01):b := 4.98554460248853E-01+I*(8.39964351973967E-01):c := -6.58099819924318E-01+I*(-1.20296917983602E+00):d := -3.25575890404143E-01+I*(2.10009824564092E-01):e := -4.09666097833457E+00+I*(4.13936073570615E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.64087292132683E-01+I*(4.79633049272704E-01):b := 2.57598467992681E-01+I*(1.09848617802088E+00):c := -3.58271460204364E-01+I*(-1.21591180274093E+00):d := -3.45486820010657E-01+I*(2.84987938059312E-01):e := -5.22399519349884E-01+I*(1.52707467961200E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.11369150901122E-01+I*(6.27607722821272E-01):b := -9.31591575278743E-02+I*(1.14164185998709E+00):c := -1.20270253711290E-01+I*(-1.03310047243600E+00):d := -4.08934479345458E-01+I*(3.29626006409462E-01):e := 3.71905980831444E-02+I*(1.00556522053851E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.22659536430897E-01+I*(5.78518809288838E-01):b := -3.89595025094959E-01+I*(9.49238374658640E-01):c := -5.54596100519818E-02+I*(-7.40074642092522E-01):d := -4.86231003463606E-01+I*(3.23037381336637E-01):e := 3.08075247582574E-01+I*(7.39514152877230E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.33048885982582E-01+I*(3.55335556879730E-01):b := -4.93003497756241E-01+I*(6.11303451147252E-01):c := -1.94165149684701E-01+I*(-4.73944354347565E-01):d := -5.41208489675043E-01+I*(2.68304953736822E-01):e := 5.04183453234497E-01+I*(5.41006599797586E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31258130188593E-01+I*(6.24878898017310E-02):b := -3.54998601896348E-01+I*(2.85960595892235E-01):c := -4.71485009074937E-01+I*(-3.59234928545683E-01):d := -5.48142361174738E-01+I*(1.91038634767148E-01):e := 6.91061526856183E-01+I*(3.47030117592739E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.18125183586971E-01+I*(-1.62997513880078E-01):b := -4.01543620416975E-02+I*(1.25441346650487E-01):c := -7.57658143947071E-01+I*(-4.49620179872839E-01):d := -5.03788182426587E-01+I*(1.27392193793008E-01):e := 9.22038168492674E-01+I*(1.00511458993201E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.06212875096650E-01+I*(-2.15613527791856E-01):b := 3.04210102875757E-01+I*(2.04854444114962E-01):c := -9.18780964034306E-01+I*(-7.02807844712882E-01):d := -4.28899766608636E-01+I*(1.07146507897602E-01):e := 1.32000627713320E+00+I*(-3.42860100657936E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.06024554458030E-01+I*(1.40767391480606E-01):b := 6.15198532299006E-01+I*(5.50562885554984E-01):c := -6.77467921276488E-01+I*(-9.57162352186629E-01):d := -3.46493308215070E-01+I*(-1.66815620008252E-01):e := 5.41500298284689E-01+I*(1.81266495188167E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.07867115529877E-01+I*(4.15341708694849E-01):b := 5.96790160011441E-01+I*(9.03485620125186E-01):c := -4.56105430063662E-01+I*(-1.15980293120295E+00):d := -3.13550962845074E-01+I*(-9.65805539612866E-02):e := -2.97089658988708E-01+I*(1.15706802439911E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.09390074468513E-01+I*(6.91140975015735E-01):b := 3.55834167755269E-01+I*(1.16200744617210E+00):c := -1.56277070343708E-01+I*(-1.17274555410786E+00):d := -3.33461892451587E-01+I*(-2.16024404660661E-02):e := -1.68533584982315E-01+I*(7.46253761773192E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.56671933236952E-01+I*(8.39115648564303E-01):b := 5.07654223471304E-03+I*(1.20516312813831E+00):c := 8.17241361493662E-02+I*(-9.89934223802931E-01):d := -3.96909551786389E-01+I*(2.30356278840841E-02):e := -1.78956736796770E-02+I*(5.94039424329072E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67962318766727E-01+I*(7.90026735031868E-01):b := -2.91359325332371E-01+I*(1.01275964280986E+00):c := 1.46534779808674E-01+I*(-6.96908393459454E-01):d := -4.74206075904537E-01+I*(1.64470028112587E-02):e := 1.10801544592636E-01+I*(5.19546424562027E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.83516683184122E-02+I*(5.66843482622761E-01):b := -3.94767797993653E-01+I*(6.74824719298471E-01):c := 7.82924017595461E-03+I*(-4.30778105714497E-01):d := -5.29183562115974E-01+I*(-3.82854247885557E-02):e := 2.37611417137023E-01+I*(4.77776884859018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.65609125244231E-02+I*(2.73995815544762E-01):b := -2.56762902133761E-01+I*(3.49481864043454E-01):c := -2.69490619214281E-01+I*(-3.16068679912616E-01):d := -5.36117433615669E-01+I*(-1.15551743758230E-01):e := 3.88210952027569E-01+I*(4.61201200900561E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.63427965922801E-01+I*(4.85104118629529E-02):b := 5.80813377208900E-02+I*(1.88962614801707E-01):c := -5.55663754086415E-01+I*(-4.06453931239772E-01):d := -4.91763254867517E-01+I*(-1.79198184732370E-01):e := 6.08392693128059E-01+I*(4.97874945914089E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.51515657432481E-01+I*(-4.10560204882561E-03):b := 4.02445802638344E-01+I*(2.68375712266182E-01):c := -7.16786574173650E-01+I*(-6.59641596079815E-01):d := -4.16874839049567E-01+I*(-1.99443870627776E-01):e := 9.69773877160885E-01+I*(7.86078662626446E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.51564936482306E-01+I*(2.03354407904166E-01):b := 6.49620760098861E-01+I*(6.62367690678374E-01):c := -5.50477971160508E-01+I*(-7.94255596262354E-01):d := -1.40209182714318E-01+I*(-3.93948001349014E-01):e := 3.59410150766811E-01+I*(7.43451656923672E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.53407497554152E-01+I*(4.77928725118409E-01):b := 6.31212387811296E-01+I*(1.01529042524858E+00):c := -3.29115479947683E-01+I*(-9.96896175278674E-01):d := -1.07266837344322E-01+I*(-3.23712935302049E-01):e := 8.49436822300469E-02+I*(7.06845580836725E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54930456492788E-01+I*(7.53727991439295E-01):b := 3.90256395555123E-01+I*(1.27381225129549E+00):c := -2.92871202277272E-02+I*(-1.00983879818359E+00):d := -1.27177766950835E-01+I*(-2.48734821806828E-01):e := 2.53635678799584E-02+I*(5.36785075258011E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.02212315261227E-01+I*(9.01702664987864E-01):b := 3.94987700345680E-02+I*(1.31696793326170E+00):c := 2.08714086265346E-01+I*(-8.27027467878656E-01):d := -1.90625426285637E-01+I*(-2.04096753456678E-01):e := 6.20563867173080E-02+I*(4.32467964748270E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.35027007910022E-02+I*(8.52613751455429E-01):b := -2.56937097532517E-01+I*(1.12456444793325E+00):c := 2.73524729924654E-01+I*(-5.34001637535179E-01):d := -2.67921950403784E-01+I*(-2.10685378529503E-01):e := 1.18760464290827E-01+I*(3.74768131225558E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.76107949657313E-01+I*(6.29430499046321E-01):b := -3.60345570193799E-01+I*(7.86629524421862E-01):c := 1.34819190291935E-01+I*(-2.67871349790222E-01):d := -3.22899436615222E-01+I*(-2.65417806129318E-01):e := 1.83920020309864E-01+I*(3.43710766156479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.77898705451302E-01+I*(3.36582831968322E-01):b := -2.22340674333906E-01+I*(4.61286669166845E-01):c := -1.42500669098301E-01+I*(-1.53161923988340E-01):d := -3.29833308114917E-01+I*(-3.42684125098992E-01):e := 2.61676159192645E-01+I*(3.35769116534125E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.96834794707614E-03+I*(1.11097428286513E-01):b := 9.25035655207443E-02+I*(3.00767419925097E-01):c := -4.28673803970435E-01+I*(-2.43547175315497E-01):d := -2.85479129366765E-01+I*(-4.06330566073132E-01):e := 3.59788788496850E-01+I*(3.67511486383854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.97056039456755E-01+I*(5.84814143747344E-02):b := 4.36868030438199E-01+I*(3.80180517389572E-01):c := -5.89796624057670E-01+I*(-4.96734840155540E-01):d := -2.10590713548815E-01+I*(-4.26576251968538E-01):e := 4.57755332241422E-01+I*(4.99099688541223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.16407401449511E-01+I*(8.77353544464634E-02):b := 6.04122972987982E-01+I*(7.70141321884702E-01):c := -5.57912469784559E-01+I*(-5.87834214650760E-01):d := 1.63811505813631E-01+I*(-4.35344619980579E-01):e := 3.84426266581443E-01+I*(4.18583140876313E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.18249962521357E-01+I*(3.62309671660706E-01):b := 5.85714600700416E-01+I*(1.12306405645490E+00):c := -3.36549978571733E-01+I*(-7.90474793667079E-01):d := 1.96753851183627E-01+I*(-3.65109553933613E-01):e := 2.55529698873509E-01+I*(4.92248806212544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.19772921459994E-01+I*(6.38108937981593E-01):b := 3.44758608444244E-01+I*(1.38158588250182E+00):c := -3.67216188517785E-02+I*(-8.03417416571994E-01):d := 1.76842921577114E-01+I*(-2.90131440438393E-01):e := 1.55606551861660E-01+I*(4.27785724362326E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.70547802284320E-02+I*(7.86083611530161E-01):b := -5.99901707631216E-03+I*(1.42474156446803E+00):c := 2.01279587641296E-01+I*(-6.20606086267061E-01):d := 1.13395262242312E-01+I*(-2.45493372088243E-01):e := 1.39499759349782E-01+I*(3.48857989543165E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21654834241792E-01+I*(7.36994697997727E-01):b := -3.02434884643396E-01+I*(1.23233807913958E+00):c := 2.66090231300603E-01+I*(-3.27580255923585E-01):d := 3.60987381241644E-02+I*(-2.52081997161068E-01):e := 1.59612503215055E-01+I*(2.93296130695221E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.11265484690108E-01+I*(5.13811445588619E-01):b := -4.05843357304678E-01+I*(8.94403155628189E-01):c := 1.27384691667884E-01+I*(-6.14499681786280E-02):d := -1.88787480872727E-02+I*(-3.06814424760883E-01):e := 1.95186344195088E-01+I*(2.57080249246392E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.13056240484097E-01+I*(2.20963778510620E-01):b := -2.67838461444786E-01+I*(5.69060300373172E-01):c := -1.49935167722352E-01+I*(5.32594576232537E-02):d := -2.58126195869680E-02+I*(-3.84080743730557E-01):e := 2.42824055712160E-01+I*(2.37225801705803E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.26189187085718E-01+I*(-4.52162517118904E-03):b := 4.70057784098650E-02+I*(4.08541051131424E-01):c := -4.36108302594485E-01+I*(-3.71257937039027E-02):d := 1.85415591611837E-02+I*(-4.47727184704697E-01):e := 3.04806974013846E-01+I*(2.40292102149814E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.18985044239608E-02+I*(-5.71376390829676E-02):b := 3.91370243327319E-01+I*(4.87954148595899E-01):c := -5.97231122681721E-01+I*(-2.90313458543946E-01):d := 9.34299749791342E-02+I*(-4.67972870600103E-01):e := 3.74674329059304E-01+I*(2.91831034327514E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.10584773486379E-01+I*(-1.51990328816994E-01):b := 4.99994091207129E-01+I*(8.23455299362033E-01):c := -6.96292732617198E-01+I*(-4.34485065926027E-01):d := 4.23314098392961E-01+I*(-2.71635537973068E-01):e := 4.15473934618624E-01+I*(2.33174707886335E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.12427334558225E-01+I*(1.22583988397249E-01):b := 4.81585718919563E-01+I*(1.17637803393224E+00):c := -4.74930241404373E-01+I*(-6.37125644942347E-01):d := 4.56256443762957E-01+I*(-2.01400471926103E-01):e := 3.73643741119637E-01+I*(3.38254811278001E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13950293496861E-01+I*(3.98383254718135E-01):b := 2.40629726663390E-01+I*(1.43489985997915E+00):c := -1.75101881684417E-01+I*(-6.50068267847261E-01):d := 4.36345514156444E-01+I*(-1.26422358430882E-01):e := 2.69596391607458E-01+I*(3.48016062074467E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.87678477347003E-02+I*(5.46357928266704E-01):b := -1.10127898857165E-01+I*(1.47805554194536E+00):c := 6.28993248086561E-02+I*(-4.67256937542329E-01):d := 3.72897854821642E-01+I*(-8.17842900807326E-02):e := 2.17024498164910E-01+I*(2.93555466015177E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27477462204925E-01+I*(4.97269014734269E-01):b := -4.06563766424249E-01+I*(1.28565205661691E+00):c := 1.27709968467964E-01+I*(-1.74231107198852E-01):d := 2.95601330703494E-01+I*(-8.83729151535579E-02):e := 2.09898086624424E-01+I*(2.39290151546108E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.17088112653240E-01+I*(2.74085762325162E-01):b := -5.09972239085531E-01+I*(9.47717133105521E-01):c := -1.09955711647553E-02+I*(9.18991805461045E-02):d := 2.40623844492057E-01+I*(-1.43105342753372E-01):e := 2.25378597002872E-01+I*(1.97151460837267E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.18878868447229E-01+I*(-1.87619047528378E-02):b := -3.71967343225639E-01+I*(6.22374277850504E-01):c := -2.88315430554991E-01+I*(2.06608606347986E-01):d := 2.33689972992362E-01+I*(-2.20371661723046E-01):e := 2.55533396072345E-01+I*(1.66478718955824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.32011815048851E-01+I*(-2.44247308434647E-01):b := -5.71231033709882E-02+I*(4.61855028608756E-01):c := -5.74488565427125E-01+I*(1.16223355020830E-01):d := 2.78044151740514E-01+I*(-2.84018102697186E-01):e := 3.00842436467342E-01+I*(1.49814157884535E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.39241235391714E-02+I*(-2.96863322346425E-01):b := 2.87241361546466E-01+I*(5.41268126073232E-01):c := -7.35611385514360E-01+I*(-1.36964309819213E-01):d := 3.52932567558464E-01+I*(-3.04263788592592E-01):e := 3.62573440905842E-01+I*(1.61516537135709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.83612636304365E-01+I*(-4.03652330433035E-01):b := 3.85957175805177E-01+I*(7.97363420529867E-01):c := -9.00869096753722E-01+I*(-4.05961921062407E-01):d := 5.16874447905739E-01+I*(2.05779457784213E-02):e := 4.49177427986799E-01+I*(8.57181705106312E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.85455197376211E-01+I*(-1.29078013218792E-01):b := 3.67548803517611E-01+I*(1.15028615510007E+00):c := -6.79506605540896E-01+I*(-6.08602500078727E-01):d := 5.49816793275735E-01+I*(9.08130118253866E-02):e := 4.82204627769849E-01+I*(1.92562310674276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.86978156314847E-01+I*(1.46721253102094E-01):b := 1.26592811261438E-01+I*(1.40880798114698E+00):c := -3.79678245820941E-01+I*(-6.21545122983641E-01):d := 5.29905863669222E-01+I*(1.65791125320607E-01):e := 3.96588624948566E-01+I*(2.73497440885663E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.42600150832856E-02+I*(2.94695926650663E-01):b := -2.24164814259116E-01+I*(1.45196366311320E+00):c := -1.41677039327867E-01+I*(-4.38733792678709E-01):d := 4.66458204334420E-01+I*(2.10429193670757E-01):e := 3.08879553495085E-01+I*(2.51616433078707E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.54449599386939E-01+I*(2.45607013118228E-01):b := -5.20600681826201E-01+I*(1.25956017778474E+00):c := -7.68663956685592E-02+I*(-1.45707962335233E-01):d := 3.89161680216273E-01+I*(2.03840568597932E-01):e := 2.72999552069275E-01+I*(1.99314040389621E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.44060249835254E-01+I*(2.24237607091204E-02):b := -6.24009154487483E-01+I*(9.21625254273355E-01):c := -2.15571935301279E-01+I*(1.20422325409724E-01):d := 3.34184194004836E-01+I*(1.49108140998117E-01):e := 2.69206746543714E-01+I*(1.50368885563249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.45851005629243E-01+I*(-2.70423906368879E-01):b := -4.86004258627590E-01+I*(5.96282399018338E-01):c := -4.92891794691514E-01+I*(2.35131751211606E-01):d := 3.27250322505140E-01+I*(7.18418220284436E-02):e := 2.84612370593755E-01+I*(1.08879490875553E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.58983952230865E-01+I*(-4.95909310050688E-01):b := -1.71160018772940E-01+I*(4.35763149776590E-01):c := -7.79064929563648E-01+I*(1.44746499884449E-01):d := 3.71604501253292E-01+I*(8.19538105430360E-03):e := 3.17478157447912E-01+I*(7.55087510452229E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.91037392788145E-02+I*(-5.48525323962466E-01):b := 1.73204446144515E-01+I*(5.15176247241065E-01):c := -9.40187749650884E-01+I*(-1.08441164955594E-01):d := 4.46492917071242E-01+I*(-1.20503048411025E-02):e := 3.72775821045464E-01+I*(5.80525378915950E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.01320441276643E-01+I*(-5.49495202933914E-01):b := 3.15371366877841E-01+I*(7.04074365472706E-01):c := -1.07591800780162E+00+I*(-5.15611076541033E-01):d := 4.00714627007476E-01+I*(3.04565894635444E-01):e := 4.92510655151549E-01+I*(-6.59738099789194E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.03163002348489E-01+I*(-2.74920885719671E-01):b := 2.96962994590276E-01+I*(1.05699710004291E+00):c := -8.54555516588793E-01+I*(-7.18251655557352E-01):d := 4.33656972377473E-01+I*(3.74800960682410E-01):e := 6.11253137198538E-01+I*(1.38826760471913E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.04685961287125E-01+I*(8.78380601215382E-04):b := 5.60070023341031E-02+I*(1.31551892608982E+00):c := -5.54727156868838E-01+I*(-7.31194278462266E-01):d := 4.13746042770959E-01+I*(4.49779074177630E-01):e := 5.82421886768722E-01+I*(1.87728035247631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.51967820055564E-01+I*(1.48853054149784E-01):b := -2.94750623186452E-01+I*(1.35867460805604E+00):c := -3.16725950375765E-01+I*(-5.48382948157335E-01):d := 3.50298383436158E-01+I*(4.94417142527780E-01):e := 4.43897973127640E-01+I*(2.24888894233369E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67417944146605E-02+I*(9.97641406173495E-02):b := -5.91186490753536E-01+I*(1.16627112272758E+00):c := -2.51915306716457E-01+I*(-2.55357117813859E-01):d := 2.73001859318010E-01+I*(4.87828517454955E-01):e := 3.64236913686986E-01+I*(1.73873066233154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.26352444862976E-01+I*(-1.23419111791758E-01):b := -6.94594963414818E-01+I*(8.28336199216194E-01):c := -3.90620846349176E-01+I*(1.07731699310987E-02):d := 2.18024373106573E-01+I*(4.33096089855140E-01):e := 3.35205814792925E-01+I*(1.13202908781395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.28143200656965E-01+I*(-4.16266778869757E-01):b := -5.56590067554926E-01+I*(5.02993343961176E-01):c := -6.67940705739412E-01+I*(1.25482595732980E-01):d := 2.11090501606877E-01+I*(3.55829770885466E-01):e := 3.33794926258580E-01+I*(5.67967977487807E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.12761472585869E-02+I*(-6.41752182551566E-01):b := -2.41745827700275E-01+I*(3.42474094719429E-01):c := -9.54113840611545E-01+I*(3.50973444058240E-02):d := 2.55444680355029E-01+I*(2.92183329911326E-01):e := 3.53593929751964E-01+I*(3.99290498606428E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.46811544251092E-01+I*(-6.94368196463345E-01):b := 1.02618637217179E-01+I*(4.21887192183904E-01):c := -1.11523666069878E+00+I*(-2.18090320434219E-01):d := 3.30333096172979E-01+I*(2.71937644015920E-01):e := 4.00798610372302E-01+I*(-4.37668846658525E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.61840286903945E-01+I*(-5.21277445413487E-01):b := 3.21264548896107E-01+I*(5.87239119844154E-01):c := -1.13953213482964E+00+I*(-7.12126473898832E-01):d := 1.29187106869077E-01+I*(4.47447191153312E-01):e := 5.65157067490400E-01+I*(-2.69382420558583E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.63682847975791E-01+I*(-2.46703128199244E-01):b := 3.02856176608542E-01+I*(9.40161854414357E-01):c := -9.18169643616810E-01+I*(-9.14767052915152E-01):d := 1.62129452239073E-01+I*(5.17682257200277E-01):e := 8.21129503936200E-01+I*(-2.90508619953574E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.65205806914427E-01+I*(2.90961381216424E-02):b := 6.19001843523689E-02+I*(1.19868368046127E+00):c := -6.18341283896855E-01+I*(-9.27709675820066E-01):d := 1.42218522632560E-01+I*(5.92660370695497E-01):e := 9.90901490112291E-01+I*(8.03201632724154E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.12487665682866E-01+I*(1.77070811670211E-01):b := -2.88857441168186E-01+I*(1.24183936242748E+00):c := -3.80340077403781E-01+I*(-7.44898345515134E-01):d := 7.87708632977583E-02+I*(6.37298439045647E-01):e := 6.98299835217307E-01+I*(2.74918553887407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.23778051212642E-01+I*(1.27981898137776E-01):b := -5.85293308735270E-01+I*(1.04943587709903E+00):c := -3.15529433744473E-01+I*(-4.51872515171658E-01):d := 1.47433917961066E-03+I*(6.30709813972822E-01):e := 5.17572969912148E-01+I*(1.99042101774315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41674007643264E-02+I*(-9.52013542713311E-02):b := -6.88701781396553E-01+I*(7.11500953587642E-01):c := -4.54234973377193E-01+I*(-1.85742227426701E-01):d := -5.35031470318265E-02+I*(5.75977386373008E-01):e := 4.47344599303245E-01+I*(1.01943688409302E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23766449703372E-02+I*(-3.88049021349331E-01):b := -5.50696885536660E-01+I*(3.86158098332625E-01):c := -7.31554832767428E-01+I*(-7.10328016248191E-02):d := -6.04370185315219E-02+I*(4.98711067403334E-01):e := 4.23517252740999E-01+I*(1.35288832699505E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.19243698368715E-01+I*(-6.13534425031139E-01):b := -2.35852645682009E-01+I*(2.25638849090877E-01):c := -1.01772796763956E+00+I*(-1.61418052951976E-01):d := -1.60828397833701E-02+I*(4.35064626429194E-01):e := 4.27135017012633E-01+I*(-7.28741023096810E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07331389878394E-01+I*(-6.66150438942918E-01):b := 1.08511819235445E-01+I*(3.05051946555352E-01):c := -1.17885078772680E+00+I*(-4.14605717792018E-01):d := 5.88055760345803E-02+I*(4.14818940533788E-01):e := 4.62698462477232E-01+I*(-1.66738040687767E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.77757885033510E-01+I*(-3.77466870339896E-01):b := 1.46177315979631E-01+I*(5.58679419128176E-01):c := -8.95576576911193E-01+I*(-1.33753230402302E+00):d := -2.85037655647634E-01+I*(5.82629884331441E-01):e := 2.24435850759841E-01+I*(-5.39725481311535E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07960044610536E+00+I*(-1.02892553125653E-01):b := 1.27768943692065E-01+I*(9.11602153698379E-01):c := -6.74214085698367E-01+I*(-1.54017288303934E+00):d := -2.52095310277638E-01+I*(6.52864950378407E-01):e := 1.73415534784809E-01+I*(-7.43678308116230E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.81123405043993E-01+I*(1.72906713195233E-01):b := -1.13187048564107E-01+I*(1.17012397974529E+00):c := -3.74385725978412E-01+I*(-1.55311550594425E+00):d := -2.72006239884151E-01+I*(7.27843063873627E-01):e := 3.08563257176037E-01+I*(-1.15006987088819E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.28405263812432E-01+I*(3.20881386743802E-01):b := -4.63944674084662E-01+I*(1.21327966171151E+00):c := -1.36384519485338E-01+I*(-1.37030417563932E+00):d := -3.35453899218953E-01+I*(7.72481132223777E-01):e := 1.22826922415075E+00+I*(-1.09152551623781E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.39695649342207E-01+I*(2.71792473211367E-01):b := -7.60380541651747E-01+I*(1.02087617638305E+00):c := -7.15738758260305E-02+I*(-1.07727834529584E+00):d := -4.12750423337101E-01+I*(7.65892507150951E-01):e := 1.03618471679048E+00+I*(-2.82753798662875E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.50084998893892E-01+I*(4.86092208022600E-02):b := -8.63789014313029E-01+I*(6.82941252871664E-01):c := -2.10279415458750E-01+I*(-8.11148057550887E-01):d := -4.67727909548538E-01+I*(7.11160079551137E-01):e := 6.82884299286380E-01+I*(-2.07971684465203E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.48294243099903E-01+I*(-2.44238446275740E-01):b := -7.25784118453136E-01+I*(3.57598397616647E-01):c := -4.87599274848986E-01+I*(-6.96438631749005E-01):d := -4.74661781048233E-01+I*(6.33893760581463E-01):e := 5.00507658144969E-01+I*(-2.59839814088058E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.35161296498281E-01+I*(-4.69723849957549E-01):b := -4.10939878598485E-01+I*(1.97079148374899E-01):c := -7.73772409721119E-01+I*(-7.86823883076162E-01):d := -4.30307602300081E-01+I*(5.70247319607323E-01):e := 3.86026088569018E-01+I*(-3.31758331699944E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.23248988007960E-01+I*(-5.22339863869327E-01):b := -6.65754136810307E-02+I*(2.76492245839375E-01):c := -9.34895229808355E-01+I*(-1.04001154791620E+00):d := -3.55419186482131E-01+I*(5.50001633711917E-01):e := 2.98862542640005E-01+I*(-4.19120529961384E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.95207615094026E-01+I*(-1.16004944381316E-01):b := 2.62260912017846E-01+I*(5.44194842979011E-01):c := -7.13093167239245E-01+I*(-1.43430453015599E+00):d := -4.72898523277320E-01+I*(3.40038554105983E-01):e := 1.17776646671467E-01+I*(-8.86716625228057E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09705017616587E+00+I*(1.58569372832928E-01):b := 2.43852539730280E-01+I*(8.97117577549213E-01):c := -4.91730676026419E-01+I*(-1.63694510917231E+00):d := -4.39956177907324E-01+I*(4.10273620152948E-01):e := -3.07088032062905E-01+I*(-1.16287137830385E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.98573135104508E-01+I*(4.34368639153814E-01):b := 2.89654747410748E-03+I*(1.15563940359613E+00):c := -1.91902316306464E-01+I*(-1.64988773207722E+00):d := -4.59867107513837E-01+I*(4.85251733648169E-01):e := -1.45531644605384E+00+I*(-1.69268053531810E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.45854993872948E-01+I*(5.82343312702382E-01):b := -3.47861078046448E-01+I*(1.19879508556234E+00):c := 4.60988901866096E-02+I*(-1.46707640177229E+00):d := -5.23314766848638E-01+I*(5.29889801998319E-01):e := -7.28979716971387E+00+I*(8.94165592778023E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.57145379402723E-01+I*(5.33254399169947E-01):b := -6.44296945613532E-01+I*(1.00639160023389E+00):c := 1.10909533845917E-01+I*(-1.17405057142881E+00):d := -6.00611290966786E-01+I*(5.23301176925493E-01):e := 1.92166663940510E+00+I*(1.11950322474569E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67534728954407E-01+I*(3.10071146760840E-01):b := -7.47705418274814E-01+I*(6.68456676722498E-01):c := -2.77960057868018E-02+I*(-9.07920283683855E-01):d := -6.55588777178223E-01+I*(4.68568749325679E-01):e := 1.19726301606205E+00+I*(9.12922200000958E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.65743973160419E-01+I*(1.72234796828404E-02):b := -6.09700522414921E-01+I*(3.43113821467481E-01):c := -3.05115865177038E-01+I*(-7.93210857881974E-01):d := -6.62522648677919E-01+I*(3.91302430356006E-01):e := 8.50072102144678E-01+I*(-2.76082468852585E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52611026558797E-01+I*(-2.08261923998968E-01):b := -2.94856282560271E-01+I*(1.82594572225733E-01):c := -5.91289000049172E-01+I*(-8.83596109209130E-01):d := -6.18168469929767E-01+I*(3.27655989381865E-01):e := 6.06766892381813E-01+I*(-5.00783825603032E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.40698718068476E-01+I*(-2.60877937910747E-01):b := 4.95081823571838E-02+I*(2.62007669690209E-01):c := -7.52411820136407E-01+I*(-1.13678377404917E+00):d := -5.43280054111817E-01+I*(3.07410303486459E-01):e := 3.82818951335065E-01+I*(-6.87536548279642E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.40510397429857E-01+I*(9.55029813617150E-02):b := 3.60496611780433E-01+I*(6.07716111130230E-01):c := -5.11098777378589E-01+I*(-1.39113828152292E+00):d := -4.60873595718251E-01+I*(3.34481755806051E-02):e := 3.33116969283906E-01+I*(-2.33659167791632E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.42352958501702E-01+I*(3.70077298575958E-01):b := 3.42088239492867E-01+I*(9.60638845700432E-01):c := -2.89736286165763E-01+I*(-1.59377886053924E+00):d := -4.27931250348254E-01+I*(1.03683241627570E-01):e := -2.90775253992471E+00+I*(-1.11701765422969E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.43875917440338E-01+I*(6.45876564896844E-01):b := 1.01132247236695E-01+I*(1.21916067174734E+00):c := 1.00920735541922E-02+I*(-1.60672148344415E+00):d := -4.47842179954767E-01+I*(1.78661355122791E-01):e := -1.42739379866851E+00+I*(1.31313665502178E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.91157776208777E-01+I*(7.93851238445413E-01):b := -2.49625378283860E-01+I*(1.26231635371356E+00):c := 2.48093280047266E-01+I*(-1.42391015313922E+00):d := -5.11289839289569E-01+I*(2.23299423472941E-01):e := -2.40288758260633E-01+I*(1.27766681848236E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.02448161738553E-01+I*(7.44762324912978E-01):b := -5.46061245850945E-01+I*(1.06991286838511E+00):c := 3.12903923706573E-01+I*(-1.13088432279575E+00):d := -5.88586363407717E-01+I*(2.16710798400116E-01):e := 3.24460895899363E-01+I*(9.86011293937718E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.12837511290238E-01+I*(5.21579072503870E-01):b := -6.49469718512227E-01+I*(7.31977944873717E-01):c := 1.74198384073854E-01+I*(-8.64754035050788E-01):d := -6.43563849619154E-01+I*(1.61978370800301E-01):e := 6.64777686964848E-01+I*(6.72885782566032E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.11046755496249E-01+I*(2.28731405425871E-01):b := -5.11464822652334E-01+I*(4.06635089618700E-01):c := -1.03121475316382E-01+I*(-7.50044609248907E-01):d := -6.50497721118850E-01+I*(8.47120518306274E-02):e := 9.11335281469415E-01+I*(3.20178608484361E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.97913808894627E-01+I*(3.24600174406244E-03):b := -1.96620582797683E-01+I*(2.46115840376953E-01):c := -3.89294610188515E-01+I*(-8.40429860576063E-01):d := -6.06143542370698E-01+I*(2.10656108564873E-02):e := 1.09994729461790E+00+I*(-1.48227893248209E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.86001500404306E-01+I*(-4.93700121677160E-02):b := 1.47743882119771E-01+I*(3.25528937841428E-01):c := -5.50417430275751E-01+I*(-1.09361752541611E+00):d := -5.31255126552747E-01+I*(8.19924961081309E-04):e := 1.15538657858611E+00+I*(-9.17493618190719E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.86050779454131E-01+I*(1.58089997785275E-01):b := 3.94918839580288E-01+I*(7.19520916253620E-01):c := -3.84108827262609E-01+I*(-1.22823152559864E+00):d := -2.54589470217498E-01+I*(-1.93684205760157E-01):e := 2.00971370104240E+00+I*(7.58289028015586E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.87893340525977E-01+I*(4.32664314999518E-01):b := 3.76510467292721E-01+I*(1.07244365082382E+00):c := -1.62746336049783E-01+I*(-1.43087210461496E+00):d := -2.21647124847502E-01+I*(-1.23449139713191E-01):e := 3.37518286328371E-01+I*(2.07889171511995E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89416299464613E-01+I*(7.08463581320404E-01):b := 1.35554475036549E-01+I*(1.33096547687074E+00):c := 1.37082023670172E-01+I*(-1.44381472751988E+00):d := -2.41558054454015E-01+I*(-4.84710262179706E-02):e := -4.21930431739026E-03+I*(1.07194563710271E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36698158233052E-01+I*(8.56438254868973E-01):b := -2.15203150484006E-01+I*(1.37412115883695E+00):c := 3.75083230163246E-01+I*(-1.26100339721495E+00):d := -3.05005713788817E-01+I*(-3.83295786782050E-03):e := 1.26310354822975E-01+I*(7.24391947309921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.79885437628279E-02+I*(8.07349341336538E-01):b := -5.11639018051090E-01+I*(1.18171767350850E+00):c := 4.39893873822553E-01+I*(-9.67977566871470E-01):d := -3.82302237906965E-01+I*(-1.04215829406457E-02):e := 2.50251982614497E-01+I*(5.54145207979374E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41622106685487E-01+I*(5.84166088927431E-01):b := -6.15047490712373E-01+I*(8.43782749997108E-01):c := 3.01188334189834E-01+I*(-7.01847279126513E-01):d := -4.37279724118402E-01+I*(-6.51540105404602E-02):e := 3.68478232595489E-01+I*(4.39975719357972E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43412862479476E-01+I*(2.91318421849431E-01):b := -4.77042594852479E-01+I*(5.18439894742091E-01):c := 2.38684747995979E-02+I*(-5.87137853324632E-01):d := -4.44213595618097E-01+I*(-1.42420329510134E-01):e := 5.03069442853202E-01+I*(3.44782359318663E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.34541909189019E-02+I*(6.58330181676223E-02):b := -1.62198354997829E-01+I*(3.57920645500343E-01):c := -2.62304660072536E-01+I*(-6.77523104651788E-01):d := -3.99859416869946E-01+I*(-2.06066770484275E-01):e := 6.95409083895495E-01+I*(2.54039992144665E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.31541882428581E-01+I*(1.32170042558438E-02):b := 1.82166109919625E-01+I*(4.37333742964818E-01):c := -4.23427480159771E-01+I*(-9.30710769491831E-01):d := -3.24971001051995E-01+I*(-2.26312456379680E-01):e := 1.06880818636917E+00+I*(1.91334959982697E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.50893244421337E-01+I*(4.24709443275733E-02):b := 3.49421052469409E-01+I*(8.27294547459948E-01):c := -3.91543325886659E-01+I*(-1.02181014398705E+00):d := 4.94312183104503E-02+I*(-2.35080824391722E-01):e := 8.17458149331499E-01+I*(2.75303917861574E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52735805493183E-01+I*(3.17045261541817E-01):b := 3.31012680181843E-01+I*(1.18021728203015E+00):c := -1.70180834673834E-01+I*(-1.22445072300337E+00):d := 8.23735636804462E-02+I*(-1.64845758344756E-01):e := 7.38347456796554E-01+I*(6.73557297102766E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54258764431819E-01+I*(5.92844527862703E-01):b := 9.00566879256704E-02+I*(1.43873910807706E+00):c := 1.29647525046121E-01+I*(-1.23739334590828E+00):d := 6.24626340739331E-02+I*(-8.98676448495361E-02):e := 3.80931268726197E-01+I*(6.57682372017277E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01540623200258E-01+I*(7.40819201411271E-01):b := -2.60700937594885E-01+I*(1.48189479004328E+00):c := 3.67648731539195E-01+I*(-1.05458201560335E+00):d := -9.85025260868390E-04+I*(-4.52295764993862E-02):e := 2.80893965953727E-01+I*(4.84090596781235E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.87168991269967E-01+I*(6.91730287878836E-01):b := -5.57136805161969E-01+I*(1.28949130471482E+00):c := 4.32459375198503E-01+I*(-7.61556185259876E-01):d := -7.82815493790161E-02+I*(-5.18182015722116E-02):e := 2.85038327124688E-01+I*(3.62581981591573E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76779641718282E-01+I*(4.68547035469729E-01):b := -6.60545277823251E-01+I*(9.51556381203435E-01):c := 2.93753835565783E-01+I*(-4.95425897514919E-01):d := -1.33259035590453E-01+I*(-1.06550629172026E-01):e := 3.20975147861992E-01+I*(2.77678504718946E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78570397512271E-01+I*(1.75699368391729E-01):b := -5.22540381963359E-01+I*(6.26213525948418E-01):c := 1.64339761755476E-02+I*(-3.80716471713037E-01):d := -1.40192907090148E-01+I*(-1.83816948141700E-01):e := 3.77064748408452E-01+I*(2.11880512949702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.91703344113893E-01+I*(-4.97860352900794E-02):b := -2.07696142108708E-01+I*(4.65694276706670E-01):c := -2.69739158696586E-01+I*(-4.71101723040194E-01):d := -9.58387283419967E-02+I*(-2.47463389115839E-01):e := 4.62196002297979E-01+I*(1.60094608832067E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.63843473957868E-02+I*(-1.02402049201858E-01):b := 1.36668322808746E-01+I*(5.45107374171146E-01):c := -4.30861978783821E-01+I*(-7.24289387880237E-01):d := -2.09503125240465E-02+I*(-2.67709075011245E-01):e := 6.03886004422089E-01+I*(1.41561390901055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.45070616458204E-01+I*(-1.97254738935885E-01):b := 2.45292170688555E-01+I*(8.80608524937280E-01):c := -5.29923588719299E-01+I*(-8.68460995262318E-01):d := 3.08933810889781E-01+I*(-7.13717423842109E-02):e := 5.73140444307139E-01+I*(3.33978182607420E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46913177530051E-01+I*(7.73195782783587E-02):b := 2.26883798400989E-01+I*(1.23353125950748E+00):c := -3.08561097506474E-01+I*(-1.07110157427864E+00):d := 3.41876156259777E-01+I*(-1.13667633724555E-03):e := 6.67253438676737E-01+I*(1.96226597938829E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.48436136468686E-01+I*(3.53118844599245E-01):b := -1.40721938551837E-02+I*(1.49205308555439E+00):c := -8.73273778651820E-03+I*(-1.08404419718355E+00):d := 3.21965226653263E-01+I*(7.38414371579750E-02):e := 5.31400474229941E-01+I*(3.55670578797196E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.28200476287433E-03+I*(5.01093518147813E-01):b := -3.64829819375739E-01+I*(1.53520876752061E+00):c := 2.29268468706555E-01+I*(-9.01232866878620E-01):d := 2.58517567318462E-01+I*(1.18479505508125E-01):e := 3.84988982839404E-01+I*(3.19812974195762E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.92991619233099E-01+I*(4.52004604615379E-01):b := -6.61265686942823E-01+I*(1.34280528219216E+00):c := 2.94079112365863E-01+I*(-6.08207036535144E-01):d := 1.81221043200314E-01+I*(1.11890880435300E-01):e := 3.30975603476420E-01+I*(2.39995926108973E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.82602269681414E-01+I*(2.28821352206271E-01):b := -7.64674159604105E-01+I*(1.00487035868077E+00):c := 1.55373572733144E-01+I*(-3.42076748790186E-01):d := 1.26243556988877E-01+I*(5.71584528354852E-02):e := 3.23520847235705E-01+I*(1.70016392549776E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.84393025475403E-01+I*(-6.40263148717282E-02):b := -6.26669263744212E-01+I*(6.79527503425750E-01):c := -1.21946286657092E-01+I*(-2.27367322988305E-01):d := 1.19309685489182E-01+I*(-2.01078661341888E-02):e := 3.40502493381681E-01+I*(1.10765111263458E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.97525972077025E-01+I*(-2.89511718553537E-01):b := -3.11825023889561E-01+I*(5.19008254184002E-01):c := -4.08119421529225E-01+I*(-3.17752574315461E-01):d := 1.63663864237333E-01+I*(-8.37543071083289E-02):e := 3.79602245987034E-01+I*(5.91022420695044E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.43828056734582E-03+I*(-3.42127732465316E-01):b := 3.25394410278929E-02+I*(5.98421351648478E-01):c := -5.69242241616461E-01+I*(-5.70940239155504E-01):d := 2.38552280055284E-01+I*(-1.03999993003735E-01):e := 4.51605209909964E-01+I*(2.02869035049558E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.18098479276190E-01+I*(-4.48916740551926E-01):b := 1.31255255286603E-01+I*(8.54516646105113E-01):c := -7.34499952855822E-01+I*(-8.39937850398699E-01):d := 4.02494160402559E-01+I*(2.20841741367279E-01):e := 4.57450206889025E-01+I*(-1.14776387886289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.19941040348036E-01+I*(-1.74342423337682E-01):b := 1.12846882999038E-01+I*(1.20743938067532E+00):c := -5.13137461642997E-01+I*(-1.04257842941502E+00):d := 4.35436505772555E-01+I*(2.91076807414244E-01):e := 5.80220253217535E-01+I*(-7.23707285193359E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.21463999286672E-01+I*(1.01456842983204E-01):b := -1.28109109257135E-01+I*(1.46596120672223E+00):c := -2.13309101923041E-01+I*(-1.05552105231993E+00):d := 4.15525576166042E-01+I*(3.66054920909464E-01):e := 6.03593049217984E-01+I*(9.42421720957710E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.87458580551111E-02+I*(2.49431516531772E-01):b := -4.78866734777690E-01+I*(1.50911688868844E+00):c := 2.46921045700322E-02+I*(-8.72709722015000E-01):d := 3.52077916831240E-01+I*(4.10692989259614E-01):e := 4.78689788971015E-01+I*(1.70194271804502E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.19963756415113E-01+I*(2.00342602999338E-01):b := -7.75302602344775E-01+I*(1.31671340335999E+00):c := 8.95027482293398E-02+I*(-5.79683891671524E-01):d := 2.74781392713092E-01+I*(4.04104364186789E-01):e := 3.86179613003962E-01+I*(1.37563287980086E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.09574406863429E-01+I*(-2.28406494097698E-02):b := -8.78711075006056E-01+I*(9.78778479848601E-01):c := -4.92027914033794E-02+I*(-3.13553603926567E-01):d := 2.19803906501655E-01+I*(3.49371936586975E-01):e := 3.45230042495583E-01+I*(8.26002310207875E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.11365162657418E-01+I*(-3.15688316487769E-01):b := -7.40706179146164E-01+I*(6.53435624593584E-01):c := -3.26522650793615E-01+I*(-1.98844178124685E-01):d := 2.12870035001960E-01+I*(2.72105617617301E-01):e := 3.34007276876554E-01+I*(2.77002724973585E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.24498109259039E-01+I*(-5.41173720169578E-01):b := -4.25861939291513E-01+I*(4.92916375351836E-01):c := -6.12695785665749E-01+I*(-2.89229429451842E-01):d := 2.57224213750112E-01+I*(2.08459176643161E-01):e := 3.44120221472559E-01+I*(-2.58275254244957E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.35895822506398E-02+I*(-5.93789734081357E-01):b := -8.14974743740587E-02+I*(5.72329472816311E-01):c := -7.73818605752984E-01+I*(-5.42417094291884E-01):d := 3.32112629568062E-01+I*(1.88213490747755E-01):e := 3.79688015043591E-01+I*(-7.78221402326197E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.35806284248469E-01+I*(-5.94759613052804E-01):b := 6.06694463592680E-02+I*(7.61227591047952E-01):c := -9.09548863903720E-01+I*(-9.49587005877324E-01):d := 2.86334339504296E-01+I*(5.04829690224301E-01):e := 3.77200323099466E-01+I*(-2.36475956427547E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.37648845320315E-01+I*(-3.20185295838561E-01):b := 4.22610740717019E-02+I*(1.11415032561815E+00):c := -6.88186372690894E-01+I*(-1.15222758489364E+00):d := 3.19276684874292E-01+I*(5.75064756271267E-01):e := 4.86528201310251E-01+I*(-2.80130407389019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.39171804258951E-01+I*(-4.43860295176748E-02):b := -1.98694918184470E-01+I*(1.37267215166507E+00):c := -3.88358012970939E-01+I*(-1.16517020779856E+00):d := 2.99365755267778E-01+I*(6.50042869766487E-01):e := 6.30109425927202E-01+I*(-1.82760353280737E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.86453663027390E-01+I*(1.03588644030894E-01):b := -5.49452543705026E-01+I*(1.41582783363128E+00):c := -1.50356806477865E-01+I*(-9.82358877493626E-01):d := 2.35918095932977E-01+I*(6.94680938116637E-01):e := 5.87772648705106E-01+I*(-6.12396389116170E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25595144283508E-03+I*(5.44997304984589E-02):b := -8.45888411272110E-01+I*(1.22342434830283E+00):c := -8.55461628185575E-02+I*(-6.89333047150149E-01):d := 1.58621571814829E-01+I*(6.88092313043812E-01):e := 4.64300939688771E-01+I*(3.06223142199463E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.91866601891150E-01+I*(-1.68683521910648E-01):b := -9.49296883933392E-01+I*(8.85489424791439E-01):c := -2.24251702451277E-01+I*(-4.23202759405192E-01):d := 1.03644085603392E-01+I*(6.33359885443997E-01):e := 3.86620536316881E-01+I*(-3.22704457368494E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.93657357685139E-01+I*(-4.61531188988648E-01):b := -8.11291988073499E-01+I*(5.60146569536423E-01):c := -5.01571561841513E-01+I*(-3.08493333603311E-01):d := 9.67102141036970E-02+I*(5.56093566474324E-01):e := 3.46527442256817E-01+I*(-5.29009068246623E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.79030428676113E-03+I*(-6.87016592670457E-01):b := -4.96447748218849E-01+I*(3.99627320294675E-01):c := -7.87744696713647E-01+I*(-3.98878584930467E-01):d := 1.41064392851849E-01+I*(4.92447125500184E-01):e := 3.30215159708313E-01+I*(-1.07888846789042E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.81297387222918E-01+I*(-7.39632606582235E-01):b := -1.52083283301394E-01+I*(4.79040417759150E-01):c := -9.48867516800882E-01+I*(-6.52066249770510E-01):d := 2.15952808669799E-01+I*(4.72201439604778E-01):e := 3.36046073974922E-01+I*(-1.69170937570045E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.96326129875771E-01+I*(-5.66541855532377E-01):b := 6.65626283775339E-02+I*(6.44392345419400E-01):c := -9.73162990931736E-01+I*(-1.14610240323512E+00):d := 1.48068193658967E-02+I*(6.47710986742169E-01):e := 3.05109015341073E-01+I*(-3.64497666397148E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.98168690947617E-01+I*(-2.91967538318134E-01):b := 4.81542560899681E-02+I*(9.97315079989603E-01):c := -7.51800499718911E-01+I*(-1.34874298225144E+00):d := 4.77491647358931E-02+I*(7.17946052789134E-01):e := 3.67679266561760E-01+I*(-4.85679140842250E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.99691649886253E-01+I*(-1.61682719972479E-02):b := -1.92801736166205E-01+I*(1.25583690603652E+00):c := -4.51972139998956E-01+I*(-1.36168560515636E+00):d := 2.78382351293795E-02+I*(7.92924166284355E-01):e := 5.90263995415637E-01+I*(-5.47221982487762E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.46973508654692E-01+I*(1.31806401551321E-01):b := -5.43559361686759E-01+I*(1.29899258800273E+00):c := -2.13970933505882E-01+I*(-1.17887427485143E+00):d := -3.56094242054220E-02+I*(8.37562234634505E-01):e := 7.60300970120064E-01+I*(-2.89847297450735E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.58263894184467E-01+I*(8.27174880188858E-02):b := -8.39995229253844E-01+I*(1.10658910267428E+00):c := -1.49160289846574E-01+I*(-8.85848444507949E-01):d := -1.12905948323570E-01+I*(8.30973609561679E-01):e := 6.09591949272693E-01+I*(-1.06713264574351E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.86532437361519E-02+I*(-1.40465764390221E-01):b := -9.43403701915126E-01+I*(7.68654179162888E-01):c := -2.87865829479293E-01+I*(-6.19718156762992E-01):d := -1.67883434535007E-01+I*(7.76241181961865E-01):e := 4.69599808669626E-01+I*(-1.01989194244607E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.68624879421628E-02+I*(-4.33313431468221E-01):b := -8.05398806055233E-01+I*(4.43311323907871E-01):c := -5.65185688869529E-01+I*(-5.05008730961110E-01):d := -1.74817306034702E-01+I*(6.98974862992191E-01):e := 3.86642705641902E-01+I*(-1.45050530359342E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.53729541340541E-01+I*(-6.58798835150030E-01):b := -4.90554566200583E-01+I*(2.82792074666123E-01):c := -8.51358823741663E-01+I*(-5.95393982288267E-01):d := -1.30463127286550E-01+I*(6.35328422018051E-01):e := 3.36214603178376E-01+I*(-2.02342120974007E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.41817232850220E-01+I*(-7.11414849061809E-01):b := -1.46190101283128E-01+I*(3.62205172130598E-01):c := -1.01248164382890E+00+I*(-8.48581647128309E-01):d := -5.55747114685998E-02+I*(6.15082736122645E-01):e := 3.07333964619865E-01+I*(-2.72556407566570E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03327097539254E+00+I*(-3.89974347610644E-01):b := -8.56730601387416E-02+I*(4.38742091313715E-01):c := -4.89176068442176E-01+I*(-1.56303712880675E+00):d := -5.01385125765112E-01+I*(6.62518620500771E-01):e := -1.68844710555539E-03+I*(-4.48398249294714E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.13511353646439E+00+I*(-1.15400030396401E-01):b := -1.04081432426308E-01+I*(7.91664825883917E-01):c := -2.67813577229350E-01+I*(-1.76567770782307E+00):d := -4.68442780395116E-01+I*(7.32753686547737E-01):e := -9.57008944272377E-02+I*(-5.00982242968638E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03663649540303E+00+I*(1.60399235924485E-01):b := -3.45037424682480E-01+I*(1.05018665193083E+00):c := 3.20147824906044E-02+I*(-1.77862033072799E+00):d := -4.88353710001629E-01+I*(8.07731800042958E-01):e := -1.91572162217489E-01+I*(-6.25506099206377E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.83918354171465E-01+I*(3.08373909473053E-01):b := -6.95795050203035E-01+I*(1.09334233389704E+00):c := 2.70015988983678E-01+I*(-1.59580900042305E+00):d := -5.51801369336431E-01+I*(8.52369868393107E-01):e := -1.81861270823641E-01+I*(-9.11828509650753E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.95208739701240E-01+I*(2.59284995940618E-01):b := -9.92230917770119E-01+I*(9.00938848568591E-01):c := 3.34826632642986E-01+I*(-1.30278317007958E+00):d := -6.29097893454578E-01+I*(8.45781243320282E-01):e := 2.72010617022800E-01+I*(-1.04584509883381E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.05598089252925E-01+I*(3.61017435315110E-02):b := -1.09563939043140E+00+I*(5.63003925057202E-01):c := 1.96121093010267E-01+I*(-1.03665288233462E+00):d := -6.84075379666015E-01+I*(7.91048815720467E-01):e := 4.28177698275944E-01+I*(-6.71694165130723E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03807333458936E-01+I*(-2.56745923546489E-01):b := -9.57634494571509E-01+I*(2.37661069802185E-01):c := -8.11987663799694E-02+I*(-9.21943456532739E-01):d := -6.91009251165711E-01+I*(7.13782496750794E-01):e := 3.04972750741739E-01+I*(-4.92612480995675E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.90674386857314E-01+I*(-4.82231327228297E-01):b := -6.42790254716858E-01+I*(7.71418205604374E-02):c := -3.67371901252103E-01+I*(-1.01232870785990E+00):d := -6.46655072417559E-01+I*(6.50136055776654E-01):e := 1.87055894300430E-01+I*(-4.37973465775127E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.78762078366994E-01+I*(-5.34847341140076E-01):b := -2.98425789799404E-01+I*(1.56554918024912E-01):c := -5.28494721339339E-01+I*(-1.26551637269994E+00):d := -5.71766656599609E-01+I*(6.29890369881248E-01):e := 8.90185772107276E-02+I*(-4.29543449872353E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05072070545306E+00+I*(-1.28512421652064E-01):b := 3.04105358994731E-02+I*(4.24257515164549E-01):c := -3.06692658770228E-01+I*(-1.65980935493972E+00):d := -6.89245993394798E-01+I*(4.19927290275314E-01):e := -1.54124524120804E-01+I*(-5.23203893322548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15256326652491E+00+I*(1.46061895562179E-01):b := 1.20021636119076E-02+I*(7.77180249734752E-01):c := -8.53301675574032E-02+I*(-1.86244993395604E+00):d := -6.56303648024802E-01+I*(4.90162356322279E-01):e := -3.04149202423117E-01+I*(-5.04064403319080E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05408622546354E+00+I*(4.21861161883065E-01):b := -2.28953828644266E-01+I*(1.03570207578166E+00):c := 2.14498192162554E-01+I*(-1.87539255686095E+00):d := -6.76214577631315E-01+I*(5.65140469817499E-01):e := -5.04678322836539E-01+I*(-5.21996172606515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.01368084231981E-01+I*(5.69835835431634E-01):b := -5.79711454164820E-01+I*(1.07885775774788E+00):c := 4.52499398655626E-01+I*(-1.69258122655602E+00):d := -7.39662236966116E-01+I*(6.09778538167649E-01):e := -8.38526781049515E-01+I*(-6.79287169611880E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.12658469761756E-01+I*(5.20746921899199E-01):b := -8.76147321731905E-01+I*(8.86454272419424E-01):c := 5.17310042314934E-01+I*(-1.39955539621255E+00):d := -8.16958761084264E-01+I*(6.03189913094824E-01):e := -1.07899309733348E+00+I*(-1.65367831439943E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23047819313441E-01+I*(2.97563669490091E-01):b := -9.79555794393187E-01+I*(5.48519348908037E-01):c := 3.78604502682215E-01+I*(-1.13342510846759E+00):d := -8.71936247295701E-01+I*(5.48457485495010E-01):e := 4.43893640400794E-01+I*(-1.57825471338247E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.21257063519452E-01+I*(4.71600241209160E-03):b := -8.41550898533294E-01+I*(2.23176493653019E-01):c := 1.01284643291979E-01+I*(-1.01871568266571E+00):d := -8.78870118795396E-01+I*(4.71191166525336E-01):e := 3.46450926791199E-01+I*(-8.65201077633382E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.08124116917831E-01+I*(-2.20769401269717E-01):b := -5.26706658678644E-01+I*(6.26572444112716E-02):c := -1.84888491580155E-01+I*(-1.10910093399286E+00):d := -8.34515940047245E-01+I*(4.07544725551196E-01):e := 1.41303089181309E-01+I*(-6.54633604353123E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.96211808427510E-01+I*(-2.73385415181496E-01):b := -1.82342193761189E-01+I*(1.42070341875747E-01):c := -3.46011311667391E-01+I*(-1.36228859883291E+00):d := -7.59627524229294E-01+I*(3.87299039655790E-01):e := -1.51738795851628E-02+I*(-5.67536089656947E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.96023487788890E-01+I*(8.29955040909661E-02):b := 1.28646235662060E-01+I*(4.87778783315768E-01):c := -1.04698268909572E-01+I*(-1.61664310630665E+00):d := -6.77221065835728E-01+I*(1.13336911749936E-01):e := -4.00615275407781E-01+I*(-7.07933275493098E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.97866048860736E-01+I*(3.57569821305209E-01):b := 1.10237863374494E-01+I*(8.40701517885971E-01):c := 1.16664222303253E-01+I*(-1.81928368532297E+00):d := -6.44278720465732E-01+I*(1.83571977796901E-01):e := -6.35972533510110E-01+I*(-5.04590826731194E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.99389007799371E-01+I*(6.33369087626095E-01):b := -1.30718128881678E-01+I*(1.09922334393288E+00):c := 4.16492582023209E-01+I*(-1.83222630822789E+00):d := -6.64189650072245E-01+I*(2.58550091292121E-01):e := -8.83647556810658E-01+I*(-2.54941001462489E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.46670866567811E-01+I*(7.81343761174664E-01):b := -4.81475754402233E-01+I*(1.14237902589910E+00):c := 6.54493788516282E-01+I*(-1.64941497792296E+00):d := -7.27637309407047E-01+I*(3.03188159642272E-01):e := -1.21771767603968E+00+I*(1.59041651464887E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.57961252097586E-01+I*(7.32254847642228E-01):b := -7.77911621969318E-01+I*(9.49975540570644E-01):c := 7.19304432175590E-01+I*(-1.35638914757948E+00):d := -8.04933833525195E-01+I*(2.96599534569446E-01):e := -1.79716698138586E+00+I*(1.30596664192320E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.68350601649271E-01+I*(5.09071595233121E-01):b := -8.81320094630600E-01+I*(6.12040617059256E-01):c := 5.80598892542870E-01+I*(-1.09025885983452E+00):d := -8.59911319736631E-01+I*(2.41867106969632E-01):e := 4.75060744437455E+00+I*(6.20768825180735E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.66559845855282E-01+I*(2.16223928155122E-01):b := -7.43315198770707E-01+I*(2.86697761804239E-01):c := 3.03279033152634E-01+I*(-9.75549434032641E-01):d := -8.66845191236327E-01+I*(1.64600787999958E-01):e := 1.62677508635348E+00+I*(-1.60517795029708E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.53426899253660E-01+I*(-9.26147552668674E-03):b := -4.28470958916056E-01+I*(1.26178512562491E-01):c := 1.71058982805010E-02+I*(-1.06593468535980E+00):d := -8.22491012488175E-01+I*(1.00954347025818E-01):e := 3.52415402040911E-01+I*(-1.19325042846452E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.41514590763340E-01+I*(-6.18774894384653E-02):b := -8.41064939986017E-02+I*(2.05591610026966E-01):c := -1.44016921806734E-01+I*(-1.31912235019984E+00):d := -7.47602596670225E-01+I*(8.07086611304118E-02):e := -1.15205650166780E-01+I*(-9.18395135136000E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.41563869813165E-01+I*(1.45582520514526E-01):b := 1.63068463461915E-01+I*(5.99583588439158E-01):c := 2.22916812064079E-02+I*(-1.45373635038238E+00):d := -4.70936940334976E-01+I*(-1.13795469590826E-01):e := -7.94547060647136E-01+I*(-1.68162269597345E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.43406430885011E-01+I*(4.20156837728769E-01):b := 1.44660091174349E-01+I*(9.52506323009361E-01):c := 2.43654172419233E-01+I*(-1.65637692939870E+00):d := -4.37994594964980E-01+I*(-4.35604035438609E-02):e := -1.54971446992466E+00+I*(-4.78220205890148E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.44929389823647E-01+I*(6.95956104049655E-01):b := -9.62959010818235E-02+I*(1.21102814905627E+00):c := 5.43482532139188E-01+I*(-1.66931955230361E+00):d := -4.57905524571493E-01+I*(3.14177099513594E-02):e := -1.26880227207473E+00+I*(5.35611673577038E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.92211248592086E-01+I*(8.43930777598224E-01):b := -4.47053526602378E-01+I*(1.25418383102249E+00):c := 7.81483738632262E-01+I*(-1.48650822199868E+00):d := -5.21353183906294E-01+I*(7.60557783015095E-02):e := -6.52648127782927E-01+I*(1.04211191913088E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03501634121861E-01+I*(7.94841864065789E-01):b := -7.43489394169463E-01+I*(1.06178034569403E+00):c := 8.46294382291570E-01+I*(-1.19348239165520E+00):d := -5.98649708024443E-01+I*(6.94671532286841E-02):e := 1.61587529567241E-02+I*(1.17845396320395E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.61090163264540E-02+I*(5.71658611656682E-01):b := -8.46897866830745E-01+I*(7.23845422182646E-01):c := 7.07588842658850E-01+I*(-9.27352103910247E-01):d := -6.53627194235880E-01+I*(1.47347256288699E-02):e := 6.71446936902209E-01+I*(1.01473088732191E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.78997721204429E-02+I*(2.78810944578682E-01):b := -7.08892970970852E-01+I*(3.98502566927629E-01):c := 4.30268983268615E-01+I*(-8.12642678108365E-01):d := -6.60561065735575E-01+I*(-6.25315933408043E-02):e := 1.25241544139365E+00+I*(5.03829177538034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.89672812779355E-02+I*(5.33255408968731E-02):b := -3.94048731116202E-01+I*(2.37983317685881E-01):c := 1.44095848396481E-01+I*(-9.03027929435522E-01):d := -6.16206886987423E-01+I*(-1.26178034314944E-01):e := 1.51197281492240E+00+I*(-4.68597105204154E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.87054972787615E-01+I*(7.09526985094616E-04):b := -4.96842661987472E-02+I*(3.17396415150356E-01):c := -1.70269716907548E-02+I*(-1.15621559427556E+00):d := -5.41318471169473E-01+I*(-1.46423720210350E-01):e := 8.13675329939596E-01+I*(-1.64619445587166E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.06406334780370E-01+I*(2.99634670568240E-02):b := 1.17570676351036E-01+I*(7.07357219645486E-01):c := 1.48571825823568E-02+I*(-1.24731496877078E+00):d := -1.66916251807027E-01+I*(-1.55192088222391E-01):e := 1.62625146254962E+00+I*(-1.05234006322631E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.08248895852216E-01+I*(3.04537784271067E-01):b := 9.91623040634697E-02+I*(1.06027995421569E+00):c := 2.36219673795183E-01+I*(-1.44995554778710E+00):d := -1.33973906437031E-01+I*(-8.49570221754257E-02):e := 1.22489923871620E+01+I*(3.95244284818874E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.09771854790853E-01+I*(5.80337050591954E-01):b := -1.41793688192703E-01+I*(1.31880178026260E+00):c := 5.36048033515138E-01+I*(-1.46289817069202E+00):d := -1.53884836043544E-01+I*(-9.97890868020527E-03):e := -2.44396720741151E-02+I*(2.04865476380008E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.57053713559291E-01+I*(7.28311724140522E-01):b := -4.92551313713258E-01+I*(1.36195746222882E+00):c := 7.74049240008212E-01+I*(-1.28008684038709E+00):d := -2.17332495378346E-01+I*(3.46591596699448E-02):e := 2.70880439815968E-01+I*(1.04735752757885E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.31655900910933E-01+I*(6.79222810608087E-01):b := -7.88987181280342E-01+I*(1.16955397690036E+00):c := 8.38859883667519E-01+I*(-9.87061010043609E-01):d := -2.94629019496494E-01+I*(2.80705345971193E-02):e := 4.30772304518567E-01+I*(6.72943656449124E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.21266551359248E-01+I*(4.56039558198980E-01):b := -8.92395653941624E-01+I*(8.31619053388974E-01):c := 7.00154344034800E-01+I*(-7.20930722298653E-01):d := -3.49606505707931E-01+I*(-2.66618930026949E-02):e := 5.47139452926005E-01+I*(4.36608331827670E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.23057307153237E-01+I*(1.63191891120980E-01):b := -7.54390758081732E-01+I*(5.06276198133957E-01):c := 4.22834484644564E-01+I*(-6.06221296496771E-01):d := -3.56540377207626E-01+I*(-1.03928211972369E-01):e := 6.56814824688771E-01+I*(2.34512030829696E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.36190253754859E-01+I*(-6.22935125608287E-02):b := -4.39546518227081E-01+I*(3.45756948892209E-01):c := 1.36661349772430E-01+I*(-6.96606547823928E-01):d := -3.12186198459474E-01+I*(-1.67574652946509E-01):e := 7.89379532706317E-01+I*(1.16259815462394E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.51897437754820E-01+I*(-1.14909526472607E-01):b := -9.51820533096265E-02+I*(4.25170046356684E-01):c := -2.44614703148054E-02+I*(-9.49794212663971E-01):d := -2.37297782641524E-01+I*(-1.87820338841915E-01):e := 1.00738193370822E+00+I*(-3.14685381361421E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.00583706817238E-01+I*(-2.09762216206634E-01):b := 1.34417945701824E-02+I*(7.60671197122818E-01):c := -1.23523080250283E-01+I*(-1.09396582004605E+00):d := 9.25863407723031E-02+I*(8.51699378511975E-03):e := 7.38279840725866E-01+I*(-3.77636460536781E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.02426267889084E-01+I*(6.48121010076092E-02):b := -4.96657771738362E-03+I*(1.11359393169302E+00):c := 9.78394109625428E-02+I*(-1.29660639906237E+00):d := 1.25528686142299E-01+I*(7.87520598320851E-02):e := 1.25304059515893E+00+I*(-4.29597555721113E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.03949226827720E-01+I*(3.40611367328495E-01):b := -2.45922569973556E-01+I*(1.37211575773993E+00):c := 3.97667770682498E-01+I*(-1.30954902196729E+00):d := 1.05617756535786E-01+I*(1.53730173327306E-01):e := 1.40802488702967E+00+I*(4.86905456463802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.12310855961593E-02+I*(4.88586040877064E-01):b := -5.96680195494111E-01+I*(1.41527143970615E+00):c := 6.35668977175572E-01+I*(-1.12673769166235E+00):d := 4.21700972009844E-02+I*(1.98368241677456E-01):e := 7.56684654256993E-01+I*(5.43644877809456E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.37478528874065E-01+I*(4.39497127344629E-01):b := -8.93116063061196E-01+I*(1.22286795437769E+00):c := 7.00479620834879E-01+I*(-8.33711861318877E-01):d := -3.51264269171636E-02+I*(1.91779616604630E-01):e := 5.60528219417643E-01+I*(3.34796149687729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.27089179322381E-01+I*(2.16313874935522E-01):b := -9.96524535722478E-01+I*(8.84933030866306E-01):c := 5.61774081202160E-01+I*(-5.67581573573920E-01):d := -9.01039131286007E-02+I*(1.37047189004816E-01):e := 5.05741207288710E-01+I*(1.79163353090926E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.28879935116369E-01+I*(-7.65337921424775E-02):b := -8.58519639862585E-01+I*(5.59590175611288E-01):c := 2.84454221811924E-01+I*(-4.52872147772039E-01):d := -9.70377846282959E-02+I*(5.97808700351419E-02):e := 4.96666909333879E-01+I*(5.32578837396752E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.42012881717991E-01+I*(-3.02019195824286E-01):b := -5.43675400007934E-01+I*(3.99070926369541E-01):c := -1.71891306020932E-03+I*(-5.43257399099195E-01):d := -5.26836058801442E-02+I*(-3.86557093899815E-03):e := 5.15594046258443E-01+I*(-6.76121246493865E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.60748097916878E-02+I*(-3.54635209736065E-01):b := -1.99310935090480E-01+I*(4.78484023834016E-01):c := -1.62841733147445E-01+I*(-7.96445063939238E-01):d := 2.22048099378062E-02+I*(-2.41112568344042E-02):e := 5.74281841068403E-01+I*(-2.04940900811410E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73611569635224E-01+I*(-4.61424217822675E-01):b := -1.00595120831769E-01+I*(7.34579318290652E-01):c := -3.28099444386806E-01+I*(-1.06544267518243E+00):d := 1.86146690285081E-01+I*(3.00730477536609E-01):e := 4.22066490980345E-01+I*(-3.53867104911101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.75454130707070E-01+I*(-1.86849900608431E-01):b := -1.19003493119335E-01+I*(1.08750205286085E+00):c := -1.06736953173980E-01+I*(-1.26808325419875E+00):d := 2.19089035655077E-01+I*(3.70965543583574E-01):e := 5.70706383112160E-01+I*(-4.76868808256514E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.76977089645706E-01+I*(8.89493657124549E-02):b := -3.59959485375508E-01+I*(1.34602387890777E+00):c := 1.93091406545975E-01+I*(-1.28102587710367E+00):d := 1.99178106048564E-01+I*(4.45943657078795E-01):e := 8.94133020758586E-01+I*(-3.73752621133221E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.24258948414145E-01+I*(2.36924039261023E-01):b := -7.10717110896063E-01+I*(1.38917956087398E+00):c := 4.31092613039049E-01+I*(-1.09821454679873E+00):d := 1.35730446713763E-01+I*(4.90581725428945E-01):e := 8.40763010668724E-01+I*(6.29403293210369E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.64450666056080E-01+I*(1.87835125728588E-01):b := -1.00715297846315E+00+I*(1.19677607554553E+00):c := 4.95903256698356E-01+I*(-8.05188716455258E-01):d := 5.84339225956150E-02+I*(4.83993100356119E-01):e := 6.06088752493405E-01+I*(6.23905596680637E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.54061316504395E-01+I*(-3.53481266805188E-02):b := -1.11056145112443E+00+I*(8.58841152034140E-01):c := 3.57197717065637E-01+I*(-5.39058428710301E-01):d := 3.45643638417789E-03+I*(4.29260672756305E-01):e := 4.82038461930007E-01+I*(1.17110934663915E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.55852072298384E-01+I*(-3.28195793758519E-01):b := -9.72556555264536E-01+I*(5.33498296779122E-01):c := 7.98778576754010E-02+I*(-4.24349002908419E-01):d := -3.47743511551751E-03+I*(3.51994353786631E-01):e := 4.20362776436575E-01+I*(-7.35528972525066E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.68985018900006E-01+I*(-5.53681197440327E-01):b := -6.57712315409886E-01+I*(3.72979047537374E-01):c := -2.06295277196733E-01+I*(-5.14734254235576E-01):d := 4.08767436326342E-02+I*(2.88347912812491E-01):e := 3.90224513463731E-01+I*(-1.52159910158985E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19102672609674E-01+I*(-6.06297211352106E-01):b := -3.13347850492432E-01+I*(4.52392145001849E-01):c := -3.67418097283968E-01+I*(-7.67921919075618E-01):d := 1.15765159450584E-01+I*(2.68102226917085E-01):e := 3.85279171291085E-01+I*(-2.41752761386395E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.91319374607502E-01+I*(-6.07267090323554E-01):b := -1.71180929759104E-01+I*(6.41290263233490E-01):c := -5.03148355434704E-01+I*(-1.17509183066106E+00):d := 6.99868693868185E-02+I*(5.84718426393632E-01):e := 2.51028656337690E-01+I*(-3.73869088241878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.93161935679348E-01+I*(-3.32692773109310E-01):b := -1.89589302046671E-01+I*(9.94212997803692E-01):c := -2.81785864221878E-01+I*(-1.37773240967738E+00):d := 1.02929214756814E-01+I*(6.54953492440597E-01):e := 2.79656904672944E-01+I*(-4.90074584019530E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.94684894617984E-01+I*(-5.68935067884241E-02):b := -4.30545294302843E-01+I*(1.25273482385061E+00):c := 1.80424954980771E-02+I*(-1.39067503258229E+00):d := 8.30182851503011E-02+I*(7.29931605935818E-01):e := 4.45264807210559E-01+I*(-5.99408043668595E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41966753386423E-01+I*(9.10811667601442E-02):b := -7.81302919823398E-01+I*(1.29589050581682E+00):c := 2.56043701991151E-01+I*(-1.20786370227736E+00):d := 1.95706258154997E-02+I*(7.74569674285968E-01):e := 6.81700743740318E-01+I*(-4.39736805443649E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.32571389161986E-02+I*(4.19922532277096E-02):b := -1.07773878739048E+00+I*(1.10348702048837E+00):c := 3.20854345650459E-01+I*(-9.14837871933883E-01):d := -5.77258983026484E-02+I*(7.67981049213143E-01):e := 6.04461131529741E-01+I*(-2.08020860651184E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.36353511532117E-01+I*(-1.81190999181398E-01):b := -1.18114726005176E+00+I*(7.65552096976978E-01):c := 1.82148806017739E-01+I*(-6.48707584188926E-01):d := -1.12703384514085E-01+I*(7.13248621613328E-01):e := 4.63781641021275E-01+I*(-1.62250381916365E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.38144267326106E-01+I*(-4.74038666259397E-01):b := -1.04314236419187E+00+I*(4.40209241721961E-01):c := -9.51710533724965E-02+I*(-5.33998158387044E-01):d := -1.19637256013781E-01+I*(6.35982302643654E-01):e := 3.70770250318672E-01+I*(-1.86004517439277E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.87227860722726E-02+I*(-6.99524069941206E-01):b := -7.28298124337221E-01+I*(2.79689992480213E-01):c := -3.81344188244630E-01+I*(-6.24383409714201E-01):d := -7.52830772656289E-02+I*(5.72335861669514E-01):e := 3.10289045916579E-01+I*(-2.31405069731031E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36810477581952E-01+I*(-7.52140083852984E-01):b := -3.83933659419767E-01+I*(3.59103089944688E-01):c := -5.42467008331866E-01+I*(-8.77571074554244E-01):d := -3.94661447678746E-04+I*(5.52090175774108E-01):e := 2.70105767455694E-01+I*(-2.91729062769096E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.51839220234804E-01+I*(-5.79049332803126E-01):b := -1.65287747740839E-01+I*(5.24455017604939E-01):c := -5.66762482462719E-01+I*(-1.37160722801886E+00):d := -2.01540650751581E-01+I*(7.27599722911499E-01):e := 1.22476676621677E-01+I*(-4.04696053163869E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.53681781306650E-01+I*(-3.04475015588883E-01):b := -1.83696120028405E-01+I*(8.77377752175141E-01):c := -3.45399991249895E-01+I*(-1.57424780703518E+00):d := -1.68598305381585E-01+I*(7.97834788958465E-01):e := 8.25319970669890E-02+I*(-4.96662275087791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.55204740245286E-01+I*(-2.86757492679971E-02):b := -4.24652112284577E-01+I*(1.13589957822205E+00):c := -4.55716315299394E-02+I*(-1.58719042994009E+00):d := -1.88509234988098E-01+I*(8.72812902453685E-01):e := 1.07073145768732E-01+I*(-6.51229287640907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.02486599013725E-01+I*(1.19298924280571E-01):b := -7.75409737805132E-01+I*(1.17905526018827E+00):c := 1.92429574963135E-01+I*(-1.40437909963516E+00):d := -2.51956894322899E-01+I*(9.17450970803835E-01):e := 3.40759377538813E-01+I*(-7.67617553157890E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13776984543500E-01+I*(7.02100107481366E-02):b := -1.07184560537222E+00+I*(9.86651774859814E-01):c := 2.57240218622442E-01+I*(-1.11135326929168E+00):d := -3.29253418441047E-01+I*(9.10862345731009E-01):e := 5.38144160976333E-01+I*(-5.39722337555984E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.24166334095185E-01+I*(-1.52973241660971E-01):b := -1.17525407803350E+00+I*(6.48716851348426E-01):c := 1.18534678989723E-01+I*(-8.45222981546725E-01):d := -3.84230904652484E-01+I*(8.56129918131195E-01):e := 4.46427316354180E-01+I*(-3.56328729748678E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22375578301196E-01+I*(-4.45820908738970E-01):b := -1.03724918217361E+00+I*(3.23373996093409E-01):c := -1.58785180400513E-01+I*(-7.30513555744844E-01):d := -3.91164776152180E-01+I*(7.78863599161521E-01):e := 3.32394004603800E-01+I*(-3.11449282948082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09242631699575E-01+I*(-6.71306312420779E-01):b := -7.22404942318956E-01+I*(1.62854746851662E-01):c := -4.44958315272647E-01+I*(-8.20898807072000E-01):d := -3.46810597404028E-01+I*(7.15217158187382E-01):e := 2.46286587239950E-01+I*(-3.18695099488484E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.97330323209254E-01+I*(-7.23922326332558E-01):b := -3.78040477401501E-01+I*(2.42267844316137E-01):c := -6.06081135359882E-01+I*(-1.07408647191204E+00):d := -2.71922181586078E-01+I*(6.94971472291975E-01):e := 1.78682132414393E-01+I*(-3.50190060362008E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08383612120052E+00+I*(-3.63872504413143E-01):b := -1.86186524141217E-01+I*(1.97834218748853E-01):c := -3.29035099532418E-02+I*(-1.47455463531466E+00):d := -7.18468392794616E-01+I*(5.84651469732542E-01):e := -1.51723717195812E-01+I*(-3.72898051443791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.18567868227236E+00+I*(-8.92981871988999E-02):b := -2.04594896428783E-01+I*(5.50756953319055E-01):c := 1.88458981259584E-01+I*(-1.67719521433098E+00):d := -6.85526047424620E-01+I*(6.54886535779507E-01):e := -2.28724528539476E-01+I*(-3.52449987032505E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08720164121100E+00+I*(1.86501079121987E-01):b := -4.45550888684955E-01+I*(8.09278779365969E-01):c := 4.88287340979539E-01+I*(-1.69013783723589E+00):d := -7.05436977031133E-01+I*(7.29864649274727E-01):e := -3.24416400742452E-01+I*(-3.61422799111671E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.34483499979437E-01+I*(3.34475752670554E-01):b := -7.96308514205510E-01+I*(8.52434461332184E-01):c := 7.26288547472612E-01+I*(-1.50732650693096E+00):d := -7.68884636365935E-01+I*(7.74502717624877E-01):e := -4.44252763853133E-01+I*(-4.39296744850221E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.45773885509213E-01+I*(2.85386839138120E-01):b := -1.09274438177259E+00+I*(6.60030976003729E-01):c := 7.91099191131920E-01+I*(-1.21430067658748E+00):d := -8.46181160484083E-01+I*(7.67914092552052E-01):e := -4.90543806080624E-01+I*(-6.82181007011348E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56163235060898E-01+I*(6.22035867290124E-02):b := -1.19615285443388E+00+I*(3.22096052492341E-01):c := 6.52393651499201E-01+I*(-9.48170388842525E-01):d := -9.01158646695520E-01+I*(7.13181664952238E-01):e := -1.88860054039906E-01+I*(-8.43221733270714E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54372479266909E-01+I*(-2.30644080348987E-01):b := -1.05814795857398E+00+I*(-3.24680276267630E-03):c := 3.75073792108965E-01+I*(-8.33460963040644E-01):d := -9.08092518195216E-01+I*(6.35915345982564E-01):e := -8.11851739177183E-03+I*(-6.50009183381276E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.41239532665287E-01+I*(-4.56129484030796E-01):b := -7.43303718719334E-01+I*(-1.63766052004424E-01):c := 8.89006572368320E-02+I*(-9.23846214367800E-01):d := -8.63738339447064E-01+I*(5.72268905008424E-01):e := -2.56447375035520E-02+I*(-4.98259746396623E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.29327224174966E-01+I*(-5.08745497942574E-01):b := -3.98939253801879E-01+I*(-8.43529545399488E-02):c := -7.22221628504039E-02+I*(-1.17703387920784E+00):d := -7.88849923629114E-01+I*(5.52023219113018E-01):e := -8.42734044309943E-02+I*(-4.17220815867515E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10128585126103E+00+I*(-1.02410578454563E-01):b := -7.01029281030024E-02+I*(1.83349642599687E-01):c := 1.49579899718706E-01+I*(-1.57132686144763E+00):d := -9.06329260424302E-01+I*(3.42060139507085E-01):e := -2.65924238331979E-01+I*(-3.36468138147214E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20312841233288E+00+I*(1.72163738759680E-01):b := -8.85113003905683E-02+I*(5.36272377169889E-01):c := 3.70942390931532E-01+I*(-1.77396744046394E+00):d := -8.73386915054306E-01+I*(4.12295205554049E-01):e := -3.23249727111231E-01+I*(-2.73066986321168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10465137127152E+00+I*(4.47963005080566E-01):b := -3.29467292646741E-01+I*(7.94794203216803E-01):c := 6.70770750651487E-01+I*(-1.78691006336886E+00):d := -8.93297844660820E-01+I*(4.87273319049270E-01):e := -4.02890723992321E-01+I*(-2.26731234325577E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.51933230039955E-01+I*(5.95937678629135E-01):b := -6.80224918167296E-01+I*(8.37949885183018E-01):c := 9.08771957144560E-01+I*(-1.60409873306393E+00):d := -9.56745503995621E-01+I*(5.31911387399420E-01):e := -5.24291843403715E-01+I*(-2.08081291515239E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.63223615569730E-01+I*(5.46848765096700E-01):b := -9.76660785734380E-01+I*(6.45546399854563E-01):c := 9.73582600803868E-01+I*(-1.31107290272045E+00):d := -1.03404202811377E+00+I*(5.25322762326595E-01):e := -7.10345426990827E-01+I*(-2.91816319955801E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73612965121414E-01+I*(3.23665512687593E-01):b := -1.08006925839566E+00+I*(3.07611476343175E-01):c := 8.34877061171149E-01+I*(-1.04494261497549E+00):d := -1.08901951432521E+00+I*(4.70590334726781E-01):e := -7.51841558982276E-01+I*(-6.48554239332425E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.71822209327425E-01+I*(3.08178456095930E-02):b := -9.42064362535770E-01+I*(-1.77313789118424E-02):c := 5.57557201780913E-01+I*(-9.30233189173612E-01):d := -1.09595338582490E+00+I*(3.93324015757107E-01):e := -3.73060181993726E-01+I*(-7.52460107931274E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.58689262725804E-01+I*(-1.94667558072216E-01):b := -6.27220122681119E-01+I*(-1.78250628153590E-01):c := 2.71384066908779E-01+I*(-1.02061844050077E+00):d := -1.05159920707675E+00+I*(3.29677574782967E-01):e := -2.25501913568559E-01+I*(-5.63202002577241E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.46776954235483E-01+I*(-2.47283571983994E-01):b := -2.82855657763664E-01+I*(-9.88375306891149E-02):c := 1.10261246821544E-01+I*(-1.27380610534081E+00):d := -9.76710791258799E-01+I*(3.09431888887560E-01):e := -2.26472791480366E-01+I*(-4.25478744567761E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.46588633596863E-01+I*(1.09097347288468E-01):b := 2.81327716595852E-02+I*(2.46870910750907E-01):c := 3.51574289579362E-01+I*(-1.52816061281456E+00):d := -8.94304332865233E-01+I*(3.54697609817058E-02):e := -4.19860065297961E-01+I*(-3.12346796937141E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04843119466871E+00+I*(3.83671664502711E-01):b := 9.72439937201924E-03+I*(5.99793645321109E-01):c := 5.72936780792187E-01+I*(-1.73080119183088E+00):d := -8.61361987495237E-01+I*(1.05704827028671E-01):e := -4.42046794157020E-01+I*(-1.95316652610289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.49954153607345E-01+I*(6.59470930823597E-01):b := -2.31231592884153E-01+I*(8.58315471368022E-01):c := 8.72765140512142E-01+I*(-1.74374381473579E+00):d := -8.81272917101750E-01+I*(1.80682940523892E-01):e := -4.89560293195603E-01+I*(-9.23503841535123E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.97236012375784E-01+I*(8.07445604372165E-01):b := -5.81989218404708E-01+I*(9.01471153334237E-01):c := 1.11076634700522E+00+I*(-1.56093248443086E+00):d := -9.44720576436551E-01+I*(2.25321008874042E-01):e := -5.76077053687675E-01+I*(1.15477116473232E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.08526397905560E-01+I*(7.58356690839730E-01):b := -8.78425085971793E-01+I*(7.09067668005783E-01):c := 1.17557699066452E+00+I*(-1.26790665408738E+00):d := -1.02201710055470E+00+I*(2.18732383801217E-01):e := -7.57000894339841E-01+I*(1.13642438839278E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.18915747457244E-01+I*(5.35173438430623E-01):b := -9.81833558633075E-01+I*(3.71132744494395E-01):c := 1.03687145103180E+00+I*(-1.00177636634243E+00):d := -1.07699458676614E+00+I*(1.63999956201403E-01):e := -1.17491624197167E+00+I*(4.27379877374919E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.17124991663255E-01+I*(2.42325771352623E-01):b := -8.43828662773182E-01+I*(4.57898892393773E-02):c := 7.59551591641569E-01+I*(-8.87066940540545E-01):d := -1.08392845826583E+00+I*(8.67336372317283E-02):e := -1.17905885387987E+00+I*(-7.23187259059398E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.03992045061633E-01+I*(1.68403676708147E-02):b := -5.28984422918532E-01+I*(-1.14729360002370E-01):c := 4.73378456769436E-01+I*(-9.77452191867702E-01):d := -1.03957427951768E+00+I*(2.30871962575884E-02):e := -5.84273544573740E-01+I*(-7.02273781669628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.92079736571313E-01+I*(-3.57756462409637E-02):b := -1.84619958001077E-01+I*(-3.53162625378952E-02):c := 3.12255636682200E-01+I*(-1.23063985670774E+00):d := -9.64685863699730E-01+I*(2.84151036218215E-03):e := -4.36411748614601E-01+I*(-4.69461250981130E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.92129015621138E-01+I*(1.71684363712028E-01):b := 6.25549994594396E-02+I*(3.58675715874297E-01):c := 4.78564239695342E-01+I*(-1.36525385689028E+00):d := -6.88020207364481E-01+I*(-1.91662620359056E-01):e := -7.01604359659598E-01+I*(-3.37520879433341E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.93971576692984E-01+I*(4.46258680926271E-01):b := 4.41466271718736E-02+I*(7.11598450444499E-01):c := 6.99926730908168E-01+I*(-1.56789443590660E+00):d := -6.55077861994485E-01+I*(-1.21427554312091E-01):e := -6.41458524955625E-01+I*(-1.06767969552369E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.95494535631620E-01+I*(7.22057947247157E-01):b := -1.96809365084299E-01+I*(9.70120276491412E-01):c := 9.99755090628122E-01+I*(-1.58083705881152E+00):d := -6.74988791600998E-01+I*(-4.64494408168699E-02):e := -6.15476615816416E-01+I*(8.16088747437550E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.42776394400059E-01+I*(8.70032620795725E-01):b := -5.47566990604854E-01+I*(1.01327595845763E+00):c := 1.23775629712120E+00+I*(-1.39802572850658E+00):d := -7.38436450935799E-01+I*(-1.81137246672003E-03):e := -6.09428359064443E-01+I*(2.77311287165240E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.54066779929834E-01+I*(8.20943707263290E-01):b := -8.44002858171939E-01+I*(8.20872473129173E-01):c := 1.30256694078050E+00+I*(-1.10499989816311E+00):d := -8.15732975053947E-01+I*(-8.39999753954505E-03):e := -6.34367224364032E-01+I*(5.38547352759025E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.55438705184812E-02+I*(5.97760454854183E-01):b := -9.47411330833221E-01+I*(4.82937549617785E-01):c := 1.16386140114778E+00+I*(-8.38869610418152E-01):d := -8.70710461265385E-01+I*(-6.31324251393593E-02):e := -7.86751697201679E-01+I*(1.01982672085299E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.73346263124701E-02+I*(3.04912787776184E-01):b := -8.09406434973328E-01+I*(1.57594694362768E-01):c := 8.86541541757549E-01+I*(-7.24160184616271E-01):d := -8.77644332765080E-01+I*(-1.40398744109033E-01):e := -2.40040531816136E+00+I*(2.05392770182992E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.49532427085908E-01+I*(7.94273840943747E-02):b := -4.94562195118677E-01+I*(-2.92455487898020E-03):c := 6.00368406885415E-01+I*(-8.14545435943427E-01):d := -8.33290154016928E-01+I*(-2.04045185083173E-01):e := -1.89011198322620E+00+I*(-1.50179930852145E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.37620118595588E-01+I*(2.68113701825963E-02):b := -1.50197730201223E-01+I*(7.64885425854951E-02):c := 4.39245586798180E-01+I*(-1.06773310078347E+00):d := -7.58401738198978E-01+I*(-2.24290870978580E-01):e := -8.76084589945762E-01+I*(-7.13259883717479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.56971480588343E-01+I*(5.60653102543252E-02):b := 1.70572123485600E-02+I*(4.66449347080624E-01):c := 4.71129741071291E-01+I*(-1.15883247527869E+00):d := -3.83999518836532E-01+I*(-2.33059238990620E-01):e := -1.34453152186352E+00+I*(-9.55079258894362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.58814041660189E-01+I*(3.30639627468569E-01):b := -1.35115993900585E-03+I*(8.19372081650827E-01):c := 6.92492232284117E-01+I*(-1.36147305429501E+00):d := -3.51057173466536E-01+I*(-1.62824172943655E-01):e := -1.16771592075722E+00+I*(-6.40268267534849E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.60337000598825E-01+I*(6.06438893789454E-01):b := -2.42307152195178E-01+I*(1.07789390769774E+00):c := 9.92320592004071E-01+I*(-1.37441567719992E+00):d := -3.70968103073049E-01+I*(-8.78460594484344E-02):e := -8.92719317453927E-01+I*(3.99118955336091E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.07618859367264E-01+I*(7.54413567338023E-01):b := -5.93064777715733E-01+I*(1.12104958966395E+00):c := 1.23032179849715E+00+I*(-1.19160434689499E+00):d := -4.34415762407850E-01+I*(-4.32079910982845E-02):e := -5.98082139930639E-01+I*(7.07991705178198E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.10907551029602E-02+I*(7.05324653805588E-01):b := -8.89500645282818E-01+I*(9.28646104335500E-01):c := 1.29513244215645E+00+I*(-8.98578516551514E-01):d := -5.11712286525998E-01+I*(-4.97966161711097E-02):e := -2.45366987315441E-01+I*(9.53749047142176E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.70701405551276E-01+I*(4.82141401396481E-01):b := -9.92909117944100E-01+I*(5.90711180824112E-01):c := 1.15642690252373E+00+I*(-6.32448228806558E-01):d := -5.66689772737435E-01+I*(-1.04529043770924E-01):e := 2.66527577167227E-01+I*(1.15757306935130E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.72492161345265E-01+I*(1.89293734318481E-01):b := -8.54904222084207E-01+I*(2.65368325569095E-01):c := 8.79107043133499E-01+I*(-5.17738803004676E-01):d := -5.73623644237131E-01+I*(-1.81795362740598E-01):e := 1.21474238427642E+00+I*(1.18270575184187E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.56251079468861E-02+I*(-3.61916693633275E-02):b := -5.40059982229557E-01+I*(1.04849076327347E-01):c := 5.92933908261365E-01+I*(-6.08124054331833E-01):d := -5.29269465488979E-01+I*(-2.45441803714738E-01):e := 2.88364050302315E+00+I*(-4.42764638118545E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.02462583562793E-01+I*(-8.88076832751058E-02):b := -1.95695517312102E-01+I*(1.84262173791822E-01):c := 4.31811088174129E-01+I*(-8.61311719171875E-01):d := -4.54381049671029E-01+I*(-2.65687489610144E-01):e := -1.86192564463823E-01+I*(-2.81899664875922E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.51148852625211E-01+I*(-1.83660373009132E-01):b := -8.70716694322932E-02+I*(5.19763324557956E-01):c := 3.32749478238652E-01+I*(-1.00548332655396E+00):d := -1.24496926257202E-01+I*(-6.93501569831098E-02):e := 3.59724927939586E-01+I*(-1.52869658197940E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52991413697057E-01+I*(9.09139442051110E-02):b := -1.05480041719859E-01+I*(8.72686059128159E-01):c := 5.54111969451477E-01+I*(-1.20812390557028E+00):d := -9.15545808872060E-02+I*(8.84909063855548E-04):e := -1.47146116457402E+00+I*(-2.17320022455221E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.54514372635693E-01+I*(3.66713210525997E-01):b := -3.46436033976032E-01+I*(1.13120788517507E+00):c := 8.53940329171433E-01+I*(-1.22106652847519E+00):d := -1.11465510493719E-01+I*(7.58630225590761E-02):e := -2.71188251723415E+00+I*(1.37439616631637E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01796231404132E-01+I*(5.14687884074566E-01):b := -6.97193659496586E-01+I*(1.17436356714129E+00):c := 1.09194153566451E+00+I*(-1.03825519817026E+00):d := -1.74913169828521E-01+I*(1.20501090909226E-01):e := -1.79965326209471E-01+I*(1.78181639533450E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86913383066092E-01+I*(4.65598970542131E-01):b := -9.93629527063671E-01+I*(9.81960081812832E-01):c := 1.15675217932381E+00+I*(-7.45229367826783E-01):d := -2.52209693946668E-01+I*(1.13912465836401E-01):e := 5.85992469209821E-01+I*(1.08170840878648E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76524033514408E-01+I*(2.42415718133024E-01):b := -1.09703799972495E+00+I*(6.44025158301444E-01):c := 1.01804663969109E+00+I*(-4.79099080081826E-01):d := -3.07187180158106E-01+I*(5.91800382365865E-02):e := 8.35988973317017E-01+I*(5.56298449207019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.78314789308397E-01+I*(-5.04319489449757E-02):b := -9.59033103865060E-01+I*(3.18682303046427E-01):c := 7.40726780300859E-01+I*(-3.64389654279944E-01):d := -3.14121051657801E-01+I*(-1.80862807330874E-02):e := 9.24242515335225E-01+I*(1.24160620992896E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.91447735910018E-01+I*(-2.75917352626785E-01):b := -6.44188864010410E-01+I*(1.58163053804679E-01):c := 4.54553645428726E-01+I*(-4.54774905607100E-01):d := -2.69766872909650E-01+I*(-8.17327217072276E-02):e := 9.22475500908464E-01+I*(-3.02201286926046E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.66399555996609E-02+I*(-3.28533366538563E-01):b := -2.99824399092955E-01+I*(2.37576151269154E-01):c := 2.93430825341490E-01+I*(-7.07962570447143E-01):d := -1.94878457091699E-01+I*(-1.01978407602634E-01):e := 8.03979514312869E-01+I*(-8.10542208521407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.24176715443197E-01+I*(-4.35322374625173E-01):b := -2.01108584834245E-01+I*(4.93671445725790E-01):c := 1.28173114102129E-01+I*(-9.76960181690337E-01):d := -3.09365767444242E-02+I*(2.22863326768379E-01):e := 2.65577821794475E-01+I*(-7.08794981307708E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.26019276515043E-01+I*(-1.60748057410930E-01):b := -2.19516957121811E-01+I*(8.46594180295992E-01):c := 3.49535605314955E-01+I*(-1.17960076070666E+00):d := 2.00576862557205E-03+I*(2.93098392815344E-01):e := 1.18123445044231E-01+I*(-1.05882489485743E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.27542235453679E-01+I*(1.15051208909956E-01):b := -4.60472949377983E-01+I*(1.10511600634291E+00):c := 6.49363965034909E-01+I*(-1.19254338361157E+00):d := -1.79051609809411E-02+I*(3.68076506310565E-01):e := 1.10370013675913E-01+I*(-2.12812628411304E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74824094222118E-01+I*(2.63025882458524E-01):b := -8.11230574898538E-01+I*(1.14827168830912E+00):c := 8.87365171527983E-01+I*(-1.00973205330664E+00):d := -8.13528203157424E-02+I*(4.12714574660715E-01):e := 3.62096964993294E+00+I*(-8.55057593557743E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13885520248107E-01+I*(2.13936968926090E-01):b := -1.10766644246562E+00+I*(9.55868202980666E-01):c := 9.52175815187291E-01+I*(-7.16706222963163E-01):d := -1.58649344433890E-01+I*(4.06125949587890E-01):e := 1.39211376886336E+00+I*(1.92338766245198E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.03496170696422E-01+I*(-9.24628348301736E-03):b := -1.21107491512691E+00+I*(6.17933279469278E-01):c := 8.13470275554572E-01+I*(-4.50575935218206E-01):d := -2.13626830645327E-01+I*(3.51393521988076E-01):e := 8.69171459799675E-01+I*(-4.97459788248676E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.05286926490411E-01+I*(-3.02093950561017E-01):b := -1.07307001926701E+00+I*(2.92590424214261E-01):c := 5.36150416164336E-01+I*(-3.35866509416324E-01):d := -2.20560702145023E-01+I*(2.74127203018402E-01):e := 6.47829710714070E-01+I*(-2.22698435417494E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.18419873092033E-01+I*(-5.27579354242826E-01):b := -7.58225779412362E-01+I*(1.32071174972513E-01):c := 2.49977281292203E-01+I*(-4.26251760743481E-01):d := -1.76206523396871E-01+I*(2.10480762044262E-01):e := 5.06260695584541E-01+I*(-3.66239697565544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.69667818417646E-01+I*(-5.80195368154604E-01):b := -4.13861314494907E-01+I*(2.11484272436988E-01):c := 8.88544612049670E-02+I*(-6.79439425583523E-01):d := -1.01318107578921E-01+I*(1.90235076148856E-01):e := 3.87934946793101E-01+I*(-5.14404583191557E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.41884520415475E-01+I*(-5.81165247126052E-01):b := -2.71694393761580E-01+I*(4.00382390668628E-01):c := -4.68757969457683E-02+I*(-1.08660933716896E+00):d := -1.47096397642687E-01+I*(5.06851275625402E-01):e := 8.24623335132458E-02+I*(-5.09033941707348E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.43727081487321E-01+I*(-3.06590929911808E-01):b := -2.90102766049146E-01+I*(7.53305125238831E-01):c := 1.74486694267057E-01+I*(-1.28924991618528E+00):d := -1.14154052272691E-01+I*(5.77086341672367E-01):e := -1.90316389320871E-02+I*(-6.20555895803423E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.45250040425957E-01+I*(-3.07916635909221E-02):b := -5.31058758305318E-01+I*(1.01182695128574E+00):c := 4.74315053987012E-01+I*(-1.30219253909020E+00):d := -1.34064981879204E-01+I*(6.52064455167588E-01):e := -9.71390403342193E-02+I*(-8.61844272528241E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.92531899194396E-01+I*(1.17183009957646E-01):b := -8.81816383825873E-01+I*(1.05498263325196E+00):c := 7.12316260480085E-01+I*(-1.11938120878526E+00):d := -1.97512641214006E-01+I*(6.96702523517738E-01):e := 1.93924689890225E-01+I*(-1.32501569190009E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03822284724171E-01+I*(6.80940964252115E-02):b := -1.17825225139296E+00+I*(8.62579147923505E-01):c := 7.77126904139394E-01+I*(-8.26355378441788E-01):d := -2.74809165332154E-01+I*(6.90113898444913E-01):e := 8.61402955330302E-01+I*(-9.05593216261942E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.57883657241438E-02+I*(-1.55089155983896E-01):b := -1.28166072405424E+00+I*(5.24644224412116E-01):c := 6.38421364506674E-01+I*(-5.60225090696831E-01):d := -3.29786651543591E-01+I*(6.35381470845099E-01):e := 6.45702800175927E-01+I*(-4.82816467134238E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.75791215181328E-02+I*(-4.47936823061896E-01):b := -1.14365582819435E+00+I*(1.99301369157099E-01):c := 3.61101505116439E-01+I*(-4.45515664894949E-01):d := -3.36720523043286E-01+I*(5.58115151875425E-01):e := 4.33282595610363E-01+I*(-4.06667451240237E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.92879318802456E-02+I*(-6.73422226743704E-01):b := -8.28811588339697E-01+I*(3.87821199153514E-02):c := 7.49283702443052E-02+I*(-5.35900916222106E-01):d := -2.92366344295134E-01+I*(4.94468710901285E-01):e := 2.91961685541080E-01+I*(-4.12482860033046E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.87375623389925E-01+I*(-7.26038240655483E-01):b := -4.84447123422242E-01+I*(1.18195217379826E-01):c := -8.61944498429306E-02+I*(-7.89088581062148E-01):d := -2.17477928477184E-01+I*(4.74223025005878E-01):e := 1.82397428741069E-01+I*(-4.47486247801758E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.02404366042777E-01+I*(-5.52947489605625E-01):b := -2.65801211743314E-01+I*(2.83547145040077E-01):c := -1.10489923973785E-01+I*(-1.28312473452676E+00):d := -4.18623917781086E-01+I*(6.49732572143269E-01):e := -4.40585757791796E-02+I*(-4.23807272625906E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00424692711462E+00+I*(-2.78373172391382E-01):b := -2.84209584030880E-01+I*(6.36469879610279E-01):c := 1.10872567239040E-01+I*(-1.48576531354308E+00):d := -3.85681572411090E-01+I*(7.19967638190235E-01):e := -1.34304131146981E-01+I*(-4.52770073113042E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.05769886053259E-01+I*(-2.57390607049533E-03):b := -5.25165576287053E-01+I*(8.94991705657193E-01):c := 4.10700926958995E-01+I*(-1.49870793644800E+00):d := -4.05592502017603E-01+I*(7.94945751685455E-01):e := -2.33791646523099E-01+I*(-5.36828262553469E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.53051744821699E-01+I*(1.45400767478073E-01):b := -8.75923201807607E-01+I*(9.38147387623408E-01):c := 6.48702133452068E-01+I*(-1.31589660614306E+00):d := -4.69040161352404E-01+I*(8.39583820035606E-01):e := -2.88566657396519E-01+I*(-7.52140600556163E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64342130351474E-01+I*(9.63118539456381E-02):b := -1.17235906937469E+00+I*(7.45743902294953E-01):c := 7.13512777111376E-01+I*(-1.02287077579959E+00):d := -5.46336685470552E-01+I*(8.32995194962781E-01):e := -1.34876328084470E-03+I*(-1.00020945058677E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74731479903158E-01+I*(-1.26871398463469E-01):b := -1.27576754203598E+00+I*(4.07808978783565E-01):c := 5.74807237478658E-01+I*(-7.56740488054630E-01):d := -6.01314171681990E-01+I*(7.78262767362966E-01):e := 2.84917039729196E-01+I*(-7.52042414160208E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.72940724109169E-01+I*(-4.19719065541469E-01):b := -1.13776264617608E+00+I*(8.24661235285477E-02):c := 2.97487378088422E-01+I*(-6.42031062252748E-01):d := -6.08248043181685E-01+I*(7.00996448393292E-01):e := 2.30518008915851E-01+I*(-5.37350808137245E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59807777507548E-01+I*(-6.45204469223278E-01):b := -8.22918406321431E-01+I*(-7.80531257132000E-02):c := 1.13142432162885E-02+I*(-7.32416313579905E-01):d := -5.63893864433533E-01+I*(6.37350007419152E-01):e := 1.31480982224655E-01+I*(-4.53204002636223E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.47895469017227E-01+I*(-6.97820483135056E-01):b := -4.78553941403977E-01+I*(1.35997175127503E-03):c := -1.49808576870947E-01+I*(-9.85603978419948E-01):d := -4.89005448615583E-01+I*(6.17104321523746E-01):e := 4.14310500897705E-02+I*(-4.23961850319640E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10579332876488E+00+I*(-3.11374683269176E-01):b := -1.08331709138316E-01+I*(-5.13207276005398E-02):c := 2.59746097533998E-01+I*(-1.11348676562506E+00):d := -8.34711783481271E-01+I*(3.85463337268192E-01):e := -2.84107436530233E-01+I*(-2.95243357320124E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20763588983673E+00+I*(-3.68003660549331E-02):b := -1.26740081425882E-01+I*(3.01602006969662E-01):c := 4.81108588746823E-01+I*(-1.31612734464138E+00):d := -8.01769438111275E-01+I*(4.55698403315157E-01):e := -3.24408531674921E-01+I*(-2.29939653831708E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10915884877536E+00+I*(2.38998900265953E-01):b := -3.67696073682055E-01+I*(5.60123833016575E-01):c := 7.80936948466778E-01+I*(-1.32906996754630E+00):d := -8.21680367717789E-01+I*(5.30676516810378E-01):e := -3.85892193044400E-01+I*(-1.79244837109180E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.56440707543802E-01+I*(3.86973573814521E-01):b := -7.18453699202610E-01+I*(6.03279514982791E-01):c := 1.01893815495985E+00+I*(-1.14625863724136E+00):d := -8.85128027052590E-01+I*(5.75314585160528E-01):e := -4.82207269255348E-01+I*(-1.48465265264170E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.67731093073577E-01+I*(3.37884660282087E-01):b := -1.01488956676969E+00+I*(4.10876029654336E-01):c := 1.08374879861916E+00+I*(-8.53232806897887E-01):d := -9.62424551170738E-01+I*(5.68725960087702E-01):e := -6.34971575877300E-01+I*(-1.85576690096676E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78120442625262E-01+I*(1.14701407872979E-01):b := -1.11829803943098E+00+I*(7.29411061429479E-02):c := 9.45043258986440E-01+I*(-5.87102519152930E-01):d := -1.01740203738217E+00+I*(5.13993532487888E-01):e := -7.40403160359183E-01+I*(-4.30771303350490E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.76329686831273E-01+I*(-1.78146259205020E-01):b := -9.80293143571083E-01+I*(-2.52401749112069E-01):c := 6.67723399596204E-01+I*(-4.72393093351049E-01):d := -1.02433590888187E+00+I*(4.36727213518214E-01):e := -4.86667763186383E-01+I*(-6.25173161430346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.63196740229651E-01+I*(-4.03631662886829E-01):b := -6.65448903716433E-01+I*(-4.12920998353817E-01):c := 3.81550264724071E-01+I*(-5.62778344678205E-01):d := -9.79981730133718E-01+I*(3.73080772544074E-01):e := -2.99541207670015E-01+I*(-5.08846324858168E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.51284431739330E-01+I*(-4.56247676798607E-01):b := -3.21084438798978E-01+I*(-3.33507900889341E-01):c := 2.20427444636835E-01+I*(-8.15966009518248E-01):d := -9.05093314315768E-01+I*(3.52835086648668E-01):e := -2.65990870363398E-01+I*(-3.83467214194573E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.12324305882540E+00+I*(-4.99127573105963E-02):b := 7.75188689989811E-03+I*(-6.58053037497056E-02):c := 4.42229507205946E-01+I*(-1.21025899175803E+00):d := -1.02257265111096E+00+I*(1.42872007042734E-01):e := -3.38483237265061E-01+I*(-1.97862283286161E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22508561989724E+00+I*(2.24661559903647E-01):b := -1.06564853876678E-02+I*(2.87117430820496E-01):c := 6.63591998418771E-01+I*(-1.41289957077435E+00):d := -9.89630305740961E-01+I*(2.13107073089700E-01):e := -3.40304886105670E-01+I*(-1.30576876938469E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.12660857883588E+00+I*(5.00460826224533E-01):b := -2.51612477643840E-01+I*(5.45639256867409E-01):c := 9.63420358138726E-01+I*(-1.42584219367926E+00):d := -1.00954123534747E+00+I*(2.88085186584920E-01):e := -3.64560644346682E-01+I*(-7.15867948072338E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.73890437604318E-01+I*(6.48435499773101E-01):b := -6.02370103164395E-01+I*(5.88794938833625E-01):c := 1.20142156463180E+00+I*(-1.24303086337433E+00):d := -1.07298889468228E+00+I*(3.32723254935070E-01):e := -4.15091923745280E-01+I*(-1.92996170070995E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.85180823134093E-01+I*(5.99346586240667E-01):b := -8.98805970731479E-01+I*(3.96391453505170E-01):c := 1.26623220829111E+00+I*(-9.50005033030856E-01):d := -1.15028541880042E+00+I*(3.26134629862244E-01):e := -5.09746443252485E-01+I*(1.23208128970711E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95570172685778E-01+I*(3.76163333831560E-01):b := -1.00221444339276E+00+I*(5.84565299937821E-02):c := 1.12752666865839E+00+I*(-6.83874745285899E-01):d := -1.20526290501186E+00+I*(2.71402202262431E-01):e := -6.54651449475031E-01+I*(-4.98437964107138E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.93779416891789E-01+I*(8.33156667535603E-02):b := -8.64209547532869E-01+I*(-2.66886325261235E-01):c := 8.50206809268153E-01+I*(-5.69165319484017E-01):d := -1.21219677651156E+00+I*(1.94135883292756E-01):e := -6.67050108535000E-01+I*(-2.72297047379333E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.80646470290167E-01+I*(-1.42169736928249E-01):b := -5.49365307678219E-01+I*(-4.27405574502983E-01):c := 5.64033674396019E-01+I*(-6.59550570811174E-01):d := -1.16784259776340E+00+I*(1.30489442318616E-01):e := -4.80306785787331E-01+I*(-3.46693357249935E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.68734161799847E-01+I*(-1.94785750840027E-01):b := -2.05000842760764E-01+I*(-3.47992477038508E-01):c := 4.02910854308783E-01+I*(-9.12738235651217E-01):d := -1.09295418194545E+00+I*(1.10243756423211E-01):e := -3.71587711180606E-01+I*(-2.76759475916903E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.68545841161227E-01+I*(1.61595168432435E-01):b := 1.05987586662486E-01+I*(-2.28403559848584E-03):c := 6.44223897066602E-01+I*(-1.16709274312496E+00):d := -1.01054772355189E+00+I*(-1.63718371482645E-01):e := -4.08872323338583E-01+I*(-1.06873462460172E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07038840223307E+00+I*(4.36169485646678E-01):b := 8.75792143749199E-02+I*(3.50638698971716E-01):c := 8.65586388279427E-01+I*(-1.36973332214128E+00):d := -9.77605378181891E-01+I*(-9.34833054356792E-02):e := -3.72929973155535E-01+I*(-4.14032315646293E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.71911361171708E-01+I*(7.11968751967564E-01):b := -1.53376777881253E-01+I*(6.09160525018629E-01):c := 1.16541474799938E+00+I*(-1.38267594504620E+00):d := -9.97516307788404E-01+I*(-1.85051919404592E-02):e := -3.65071486663113E-01+I*(2.27613933286426E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.19193219940147E-01+I*(8.59943425516132E-01):b := -5.04134403401808E-01+I*(6.52316206984844E-01):c := 1.40341595449246E+00+I*(-1.19986461474126E+00):d := -1.06096396712320E+00+I*(2.61328764096911E-02):e := -3.80961761388237E-01+I*(8.82308985731433E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.30483605469923E-01+I*(8.10854511983697E-01):b := -8.00570270968892E-01+I*(4.59912721656390E-01):c := 1.46822659815176E+00+I*(-9.06838784397789E-01):d := -1.13826049124135E+00+I*(1.95442513368666E-02):e := -4.32411113191197E-01+I*(1.55427625669065E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.40872955021607E-01+I*(5.87671259574590E-01):b := -9.03978743630175E-01+I*(1.21977798145002E-01):c := 1.32952105851904E+00+I*(-6.40708496652831E-01):d := -1.19323797745279E+00+I*(-3.51881762629481E-02):e := -5.52292520601627E-01+I*(1.97078295276322E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.39082199227619E-01+I*(2.94823592496591E-01):b := -7.65973847770281E-01+I*(-2.03365057110015E-01):c := 1.05220119912881E+00+I*(-5.25999070850950E-01):d := -1.20017184895249E+00+I*(-1.12454495232622E-01):e := -7.18364178721209E-01+I*(8.59489371828500E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.25949252625997E-01+I*(6.93381888147820E-02):b := -4.51129607915631E-01+I*(-3.63884306351763E-01):c := 7.66028064256675E-01+I*(-6.16384322178107E-01):d := -1.15581767020433E+00+I*(-1.76100936206762E-01):e := -6.58880623190283E-01+I*(-1.35412783569268E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.14036944135676E-01+I*(1.67221749030034E-02):b := -1.06765142998177E-01+I*(-2.84471208887288E-01):c := 6.04905244169440E-01+I*(-8.69571987018150E-01):d := -1.08092925438638E+00+I*(-1.96346622102168E-01):e := -4.95877739804011E-01+I*(-1.63749647577064E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.14086223185502E-01+I*(2.24182184855995E-01):b := 1.40409814462340E-01+I*(1.09520769524904E-01):c := 7.71213847182582E-01+I*(-1.00418598720069E+00):d := -8.04263598051136E-01+I*(-3.90850752823406E-01):e := -5.22554814346680E-01+I*(-3.98834790723164E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.15928784257347E-01+I*(4.98756502070238E-01):b := 1.22001442174774E-01+I*(4.62443504095106E-01):c := 9.92576338395407E-01+I*(-1.20682656621701E+00):d := -7.71321252681139E-01+I*(-3.20615686776441E-01):e := -4.32905538054884E-01+I*(5.51776289141630E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.17451743195984E-01+I*(7.74555768391124E-01):b := -1.18954550081398E-01+I*(7.20965330142019E-01):c := 1.29240469811536E+00+I*(-1.21976918912192E+00):d := -7.91232182287653E-01+I*(-2.45637573281221E-01):e := -3.85447365013934E-01+I*(1.23509912145066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.64733601964422E-01+I*(9.22530441939692E-01):b := -4.69712175601953E-01+I*(7.64121012108234E-01):c := 1.53040590460844E+00+I*(-1.03695785881699E+00):d := -8.54679841622454E-01+I*(-2.00999504931071E-01):e := -3.63313060565894E-01+I*(1.99348363212361E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76023987494198E-01+I*(8.73441528407258E-01):b := -7.66148043169037E-01+I*(5.71717526779780E-01):c := 1.59521654826774E+00+I*(-7.43932028473514E-01):d := -9.31976365740602E-01+I*(-2.07588130003896E-01):e := -3.68446099771230E-01+I*(2.90824362515278E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.35866629541174E-02+I*(6.50258275998150E-01):b := -8.69556515830320E-01+I*(2.33782603268392E-01):c := 1.45651100863502E+00+I*(-4.77801740728556E-01):d := -9.86953851952039E-01+I*(-2.62320557603710E-01):e := -4.31365244334760E-01+I*(4.05620638171661E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.53774187481062E-02+I*(3.57410608920151E-01):b := -7.31551619970427E-01+I*(-9.15602519866250E-02):c := 1.17919114924479E+00+I*(-3.63092314926675E-01):d := -9.93887723451734E-01+I*(-3.39586876573384E-01):e := -6.41839185797829E-01+I*(4.81716917984978E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71489634650272E-01+I*(1.31925205238342E-01):b := -4.16707380115776E-01+I*(-2.52079501228373E-01):c := 8.93018014372655E-01+I*(-4.53477566253832E-01):d := -9.49533544703583E-01+I*(-4.03233317547524E-01):e := -8.65527552969012E-01+I*(2.27920509450033E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.59577326159952E-01+I*(7.93091913265637E-02):b := -7.23429151983219E-02+I*(-1.72666403763898E-01):c := 7.31895194285419E-01+I*(-7.06665231093875E-01):d := -8.74645128885633E-01+I*(-4.23479003442930E-01):e := -6.93115799196732E-01+I*(-8.00505841051012E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.78928688152707E-01+I*(1.08563131398293E-01):b := 9.49120273514608E-02+I*(2.17294400731232E-01):c := 7.63779348558531E-01+I*(-7.97764605589094E-01):d := -5.00242909523186E-01+I*(-4.32247371454971E-01):e := -7.81469057798691E-01+I*(1.19406488918787E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.80771249224553E-01+I*(3.83137448612536E-01):b := 7.65036550638949E-02+I*(5.70217135301434E-01):c := 9.85141839771357E-01+I*(-1.00040518460541E+00):d := -4.67300564153190E-01+I*(-3.62012305408006E-01):e := -5.67419349369202E-01+I*(1.74600127860986E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.82294208163189E-01+I*(6.58936714933422E-01):b := -1.64452337192278E-01+I*(8.28738961348347E-01):c := 1.28497019949131E+00+I*(-1.01334780751033E+00):d := -4.87211493759704E-01+I*(-2.87034191912785E-01):e := -4.47497880055332E-01+I*(2.54136878519709E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.29576066931629E-01+I*(8.06911388481990E-01):b := -5.15209962712832E-01+I*(8.71894643314563E-01):c := 1.52297140598438E+00+I*(-8.30536477205396E-01):d := -5.50659153094505E-01+I*(-2.42396123562635E-01):e := -3.65230956782912E-01+I*(3.43614773459825E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.91335475385967E-02+I*(7.57822474949556E-01):b := -8.11645830279917E-01+I*(6.79491157986107E-01):c := 1.58778204964369E+00+I*(-5.37510646861919E-01):d := -6.27955677212653E-01+I*(-2.48984748635461E-01):e := -3.01606850142871E-01+I*(4.55976262639779E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.48744197986911E-01+I*(5.34639222540448E-01):b := -9.15054302941199E-01+I*(3.41556234474719E-01):c := 1.44907651001097E+00+I*(-2.71380359116962E-01):d := -6.82933163424090E-01+I*(-3.03717176235275E-01):e := -2.60389050632428E-01+I*(6.25499403085865E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.50534953780901E-01+I*(2.41791555462449E-01):b := -7.77049407081307E-01+I*(1.62133792197024E-02):c := 1.17175665062074E+00+I*(-1.56670933315081E-01):d := -6.89867034923786E-01+I*(-3.80983495204949E-01):e := -3.26746471599639E-01+I*(9.34314156471070E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.36679003825223E-02+I*(1.63061517806403E-02):b := -4.62205167226656E-01+I*(-1.44305870022045E-01):c := 8.85583515748604E-01+I*(-2.47056184642238E-01):d := -6.45512856175634E-01+I*(-4.44629936179089E-01):e := -1.00695891657534E+00+I*(1.18275649266684E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24419791127157E-01+I*(-3.63098621311384E-02):b := -1.17840702309201E-01+I*(-6.48927725575703E-02):c := 7.24460695661369E-01+I*(-5.00243849482280E-01):d := -5.70624440357683E-01+I*(-4.64875622074495E-01):e := -1.21170341877704E+00+I*(2.93826333969304E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73106060189575E-01+I*(-1.31162551865164E-01):b := -9.21685442939231E-03+I*(2.70608378208564E-01):c := 6.25399085725892E-01+I*(-6.44415456864362E-01):d := -2.40740316943857E-01+I*(-2.68538289447460E-01):e := -1.61253422670103E+00+I*(-2.05112516856165E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.74948621261421E-01+I*(1.43411765349079E-01):b := -2.76252267169581E-02+I*(6.23531112778766E-01):c := 8.46761576938717E-01+I*(-8.47056035880681E-01):d := -2.07797971573861E-01+I*(-1.98303223400495E-01):e := -9.77760065891375E-01+I*(2.28571877007900E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.76471580200057E-01+I*(4.19211031669965E-01):b := -2.68581218973131E-01+I*(8.82052938825679E-01):c := 1.14658993665867E+00+I*(-8.59998658785595E-01):d := -2.27708901180374E-01+I*(-1.23325109905275E-01):e := -6.64747171799531E-01+I*(4.37604204498713E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.23753438968496E-01+I*(5.67185705218533E-01):b := -6.19338844493686E-01+I*(9.25208620791894E-01):c := 1.38459114315175E+00+I*(-6.77187328480663E-01):d := -2.91156560515175E-01+I*(-7.86870415551250E-02):e := -4.35559583294795E-01+I*(5.88673079575583E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.64956175501728E-01+I*(5.18096791686099E-01):b := -9.15774712060770E-01+I*(7.32805135463440E-01):c := 1.44940178681105E+00+I*(-3.84161498137187E-01):d := -3.68453084633323E-01+I*(-8.52756666279500E-02):e := -2.15004772824372E-01+I*(7.32485289634829E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.54566825950044E-01+I*(2.94913539276991E-01):b := -1.01918318472205E+00+I*(3.94870211952051E-01):c := 1.31069624717833E+00+I*(-1.18031210392230E-01):d := -4.23430570844760E-01+I*(-1.40008094227764E-01):e := 6.06910059572360E-02+I*(9.10113969223723E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.56357581744033E-01+I*(2.06587219899183E-03):b := -8.81178288862160E-01+I*(6.95273566970344E-02):c := 1.03337638778810E+00+I*(-3.32178459034849E-03):d := -4.30364442344456E-01+I*(-2.17274413197438E-01):e := 5.44467698790692E-01+I*(1.21614454829176E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.69490528345655E-01+I*(-2.23419531482817E-01):b := -5.66334049007509E-01+I*(-9.09918925447133E-02):c := 7.47203252915965E-01+I*(-9.37070359175051E-02):d := -3.86010263596304E-01+I*(-2.80920854171578E-01):e := 2.25735327776048E+00+I*(2.24359746282946E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.18597163164025E-01+I*(-2.76035545394596E-01):b := -2.21969584090054E-01+I*(-1.15787950802382E-02):c := 5.86080432828729E-01+I*(-3.46894700757548E-01):d := -3.11121847778353E-01+I*(-3.01166540066984E-01):e := -5.40949962585300E+00+I*(-3.09490033634557E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46133923007560E-01+I*(-3.82824553481206E-01):b := -1.23253769831344E-01+I*(2.44516499376397E-01):c := 4.20822721589369E-01+I*(-6.15892312000742E-01):d := -1.47179967431078E-01+I*(2.36751943040292E-02):e := -5.14587318707609E-01+I*(-1.22230566780359E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.47976484079406E-01+I*(-1.08250236266963E-01):b := -1.41662142118910E-01+I*(5.97439233946599E-01):c := 6.42185212802194E-01+I*(-8.18532891017062E-01):d := -1.14237622061082E-01+I*(9.39102603509943E-02):e := -1.12857852483574E+00+I*(-6.76100451995663E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.49499443018042E-01+I*(1.67549030053923E-01):b := -3.82618134375082E-01+I*(8.55961059993512E-01):c := 9.42013572522149E-01+I*(-8.31475513921976E-01):d := -1.34148551667595E-01+I*(1.68888373846215E-01):e := -1.35278779610376E+00+I*(1.35993204418816E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.96781301786481E-01+I*(3.15523703602492E-01):b := -7.33375759895638E-01+I*(8.99116741959728E-01):c := 1.18001477901522E+00+I*(-6.48664183617044E-01):d := -1.97596211002397E-01+I*(2.13526442196365E-01):e := -1.04028897779603E+00+I*(1.01061622450853E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.19283126837429E-02+I*(2.66434790070057E-01):b := -1.02981162746272E+00+I*(7.06713256631273E-01):c := 1.24482542267453E+00+I*(-3.55638353273568E-01):d := -2.74892735120545E-01+I*(2.06937817123540E-01):e := -1.24473940536300E-01+I*(1.55352166502035E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.81538963132059E-01+I*(4.32515376609499E-02):b := -1.13322010012400E+00+I*(3.68778333119885E-01):c := 1.10611988304181E+00+I*(-8.95080655286104E-02):d := -3.29870221331982E-01+I*(1.52205389523725E-01):e := 1.02875977203275E+00+I*(1.25505717103596E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.83329718926048E-01+I*(-2.49596129417050E-01):b := -9.95215204264111E-01+I*(4.34354778648680E-02):c := 8.28800023651575E-01+I*(2.52013602732712E-02):d := -3.36804092831677E-01+I*(7.49390705540514E-02):e := 1.58305867962179E+00+I*(1.71524317141291E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.64626655276691E-02+I*(-4.75081533098858E-01):b := -6.80370964409461E-01+I*(-1.17083771376880E-01):c := 5.42626888779442E-01+I*(-6.51838910538855E-02):d := -2.92449914083525E-01+I*(1.12926295799113E-02):e := 1.20422514759199E+00+I*(-8.81834787924008E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.91625025982010E-01+I*(-5.27697547010637E-01):b := -3.36006499492006E-01+I*(-3.76706739124045E-02):c := 3.81504068692206E-01+I*(-3.18371555893928E-01):d := -2.17561498265575E-01+I*(-8.95305631549471E-03):e := 3.44672882506493E-01+I*(-1.34647147834311E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.63841727979839E-01+I*(-5.28667425982084E-01):b := -1.93839578758679E-01+I*(1.51227444319236E-01):c := 2.45773810541471E-01+I*(-7.25541467479368E-01):d := -2.63339788329342E-01+I*(3.07663143161052E-01):e := -2.14277264777180E-01+I*(-6.59173929552825E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.65684289051685E-01+I*(-2.54093108767841E-01):b := -2.12247951046245E-01+I*(5.04150178889438E-01):c := 4.67136301754296E-01+I*(-9.28182046495687E-01):d := -2.30397442959346E-01+I*(3.77898209208017E-01):e := -4.50277024024973E-01+I*(-5.96871049152625E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.67207247990321E-01+I*(2.17061575530453E-02):b := -4.53203943302418E-01+I*(7.62672004936351E-01):c := 7.66964661474252E-01+I*(-9.41124669400601E-01):d := -2.50308372565859E-01+I*(4.52876322703238E-01):e := -7.71166467657594E-01+I*(-5.25756373716115E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.14489106758760E-01+I*(1.69680831101613E-01):b := -8.03961568822973E-01+I*(8.05827686902566E-01):c := 1.00496586796732E+00+I*(-7.58313339095669E-01):d := -3.13756031900660E-01+I*(4.97514391053388E-01):e := -1.41307109647363E+00+I*(-4.28896271801433E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.25779492288535E-01+I*(1.20591917569179E-01):b := -1.10039743639006E+00+I*(6.13424201574112E-01):c := 1.06977651162663E+00+I*(-4.65287508752193E-01):d := -3.91052556018808E-01+I*(4.90925765980562E-01):e := -4.72665867449887E+00+I*(-8.66362890718574E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.38311581597797E-02+I*(-1.02591334839928E-01):b := -1.20380590905134E+00+I*(2.75489278062724E-01):c := 9.31070971993913E-01+I*(-1.99157221007236E-01):d := -4.46030042230245E-01+I*(4.36193338380748E-01):e := 2.45854260780320E+00+I*(-2.07857549757487E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.56219139537690E-02+I*(-3.95439001917928E-01):b := -1.06580101319145E+00+I*(-4.98535771922935E-02):c := 6.53751112603678E-01+I*(-8.44477952053544E-02):d := -4.52963913729940E-01+I*(3.58927019411074E-01):e := 7.93850070215783E-01+I*(-1.02740393983409E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.21245139444609E-01+I*(-6.20924405599737E-01):b := -7.50956773336796E-01+I*(-2.10372826434041E-01):c := 3.67577977731544E-01+I*(-1.74833046532511E-01):d := -4.08609734981789E-01+I*(2.95280578436934E-01):e := 2.97529935691884E-01+I*(-8.24669768606621E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.09332830954289E-01+I*(-6.73540419511516E-01):b := -4.06592308419342E-01+I*(-1.30959728969566E-01):c := 2.06455157644309E-01+I*(-4.28020711372554E-01):d := -3.33721319163838E-01+I*(2.75034892541528E-01):e := 1.32247977649999E-02+I*(-7.27498173775757E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.24361573607141E-01+I*(-5.00449668461658E-01):b := -1.87946396740414E-01+I*(3.43921986906845E-02):c := 1.82159683513454E-01+I*(-9.22056864837167E-01):d := -5.34867308467740E-01+I*(4.50544439678919E-01):e := -2.37282114279932E-01+I*(-4.25752033840447E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.02620413467899E+00+I*(-2.25875351247414E-01):b := -2.06354769027980E-01+I*(3.87314933260887E-01):c := 4.03522174726280E-01+I*(-1.12469744385349E+00):d := -5.01924963097744E-01+I*(5.20779505725885E-01):e := -3.34676273071074E-01+I*(-3.66590832984679E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.27727093617623E-01+I*(4.99239150734716E-02):b := -4.47310761284152E-01+I*(6.45836759307799E-01):c := 7.03350534446235E-01+I*(-1.13764006675840E+00):d := -5.21835892704257E-01+I*(5.95757619221105E-01):e := -4.61541087862075E-01+I*(-3.28527861506423E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.75008952386062E-01+I*(1.97898588622040E-01):b := -7.98068386804707E-01+I*(6.88992441274015E-01):c := 9.41351740939309E-01+I*(-9.54828736453469E-01):d := -5.85283552039059E-01+I*(6.40395687571255E-01):e := -6.58961567223294E-01+I*(-3.38458630338342E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.86299337915837E-01+I*(1.48809675089606E-01):b := -1.09450425437179E+00+I*(4.96588955945560E-01):c := 1.00616238459862E+00+I*(-6.61802906109992E-01):d := -6.62580076157207E-01+I*(6.33807062498430E-01):e := -9.67216001496560E-01+I*(-5.84289476790868E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.96688687467522E-01+I*(-7.43735773195020E-02):b := -1.19791272703307E+00+I*(1.58654032434172E-01):c := 8.67456844965897E-01+I*(-3.95672618365035E-01):d := -7.17557562368644E-01+I*(5.79074634898615E-01):e := -6.51030935141633E-01+I*(-1.28027408944635E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.94897931673533E-01+I*(-3.67221244397501E-01):b := -1.05990783117318E+00+I*(-1.66688822820845E-01):c := 5.90136985575661E-01+I*(-2.80963192563154E-01):d := -7.24491433868339E-01+I*(5.01808315928942E-01):e := -7.67522177510268E-02+I*(-9.65216176859824E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.81764985071911E-01+I*(-5.92706648079310E-01):b := -7.45063591318530E-01+I*(-3.27208072062592E-01):c := 3.03963850703528E-01+I*(-3.71348443890310E-01):d := -6.80137255120187E-01+I*(4.38161874954802E-01):e := -7.34216350288650E-02+I*(-6.61640127938410E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.69852676581591E-01+I*(-6.45322661991089E-01):b := -4.00699126401076E-01+I*(-2.47794974598118E-01):c := 1.42841030616292E-01+I*(-6.24536108730353E-01):d := -6.05248839302237E-01+I*(4.17916189059396E-01):e := -1.50900918069521E-01+I*(-5.12964756012300E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08886857663909E+00+I*(-2.57045198140297E-01):b := 1.11462251670216E-01+I*(-1.92140379288797E-01):c := 2.51838750238162E-01+I*(-6.48781188788114E-01):d := -7.95723723421406E-01+I*(1.58156564017296E-01):e := -4.33821008069227E-01+I*(-1.93388066094038E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19071113771094E+00+I*(1.75291190739460E-02):b := 9.30538793826501E-02+I*(1.60782355281406E-01):c := 4.73201241450987E-01+I*(-8.51421767804433E-01):d := -7.62781378051410E-01+I*(2.28391630064261E-01):e := -4.13841872004102E-01+I*(-1.00247680880124E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.09223409664957E+00+I*(2.93328385394832E-01):b := -1.47902112873522E-01+I*(4.19304181328319E-01):c := 7.73029601170943E-01+I*(-8.64364390709348E-01):d := -7.82692307657923E-01+I*(3.03369743559482E-01):e := -4.22735697264725E-01+I*(-1.58728781826877E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.39515955418010E-01+I*(4.41303058943400E-01):b := -4.98659738394077E-01+I*(4.62459863294534E-01):c := 1.01103080766402E+00+I*(-6.81553060404416E-01):d := -8.46139966992724E-01+I*(3.48007811909632E-01):e := -4.60283109395344E-01+I*(6.89188648547925E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.50806340947785E-01+I*(3.92214145410965E-01):b := -7.95095605961161E-01+I*(2.70056377966079E-01):c := 1.07584145132332E+00+I*(-3.88527230060939E-01):d := -9.23436491110872E-01+I*(3.41419186836806E-01):e := -5.50318448230312E-01+I*(1.56205905887493E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.61195690499470E-01+I*(1.69030893001858E-01):b := -8.98504078622444E-01+I*(-6.78785455453086E-02):c := 9.37135911690604E-01+I*(-1.22396942315983E-01):d := -9.78413977322309E-01+I*(2.86686759236992E-01):e := -7.57898454735651E-01+I*(1.92144801629862E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59404934705481E-01+I*(-1.23816774076141E-01):b := -7.60499182762551E-01+I*(-3.93221400800326E-01):c := 6.59816052300369E-01+I*(-7.68751651410098E-03):d := -9.85347848822004E-01+I*(2.09420440267318E-01):e := -9.85284795873741E-01+I*(-9.26638413111948E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.46271988103859E-01+I*(-3.49302177757950E-01):b := -4.45654942907901E-01+I*(-5.53740650042074E-01):c := 3.73642917428235E-01+I*(-9.80727678412575E-02):d := -9.40993670073853E-01+I*(1.45773999293178E-01):e := -7.26932179978731E-01+I*(-3.72253327535995E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.34359679613539E-01+I*(-4.01918191669728E-01):b := -1.01290477990446E-01+I*(-4.74327552577599E-01):c := 2.12520097340999E-01+I*(-3.51260432681300E-01):d := -8.66105254255902E-01+I*(1.25528313397772E-01):e := -5.10076781259495E-01+I*(-3.01862012568019E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10631830669961E+00+I*(4.41672781828275E-03):b := 2.27545847708431E-01+I*(-2.06624955437963E-01):c := 4.34322159910110E-01+I*(-7.45553414921083E-01):d := -9.83584591051091E-01+I*(-8.44347662081617E-02):e := -4.00991147089752E-01+I*(-6.35906660153997E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.20816086777145E+00+I*(2.78991045032526E-01):b := 2.09137475420865E-01+I*(1.46297779132240E-01):c := 6.55684651122935E-01+I*(-9.48193993937402E-01):d := -9.50642245681095E-01+I*(-1.41997001611965E-02):e := -3.57845660973749E-01+I*(-1.04391854526810E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10968382671009E+00+I*(5.54790311353412E-01):b := -3.18185168353078E-02+I*(4.04819605179153E-01):c := 9.55513010842890E-01+I*(-9.61136616842316E-01):d := -9.70553175287608E-01+I*(6.07784133340239E-02):e := -3.42126314506249E-01+I*(4.55960918405980E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.56965685478526E-01+I*(7.02764984901981E-01):b := -3.82576142355863E-01+I*(4.47975287145368E-01):c := 1.19351421733596E+00+I*(-7.78325286537384E-01):d := -1.03400083462241E+00+I*(1.05416481684174E-01):e := -3.48278996325529E-01+I*(1.04381569461138E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.68256071008301E-01+I*(6.53676071369546E-01):b := -6.79012009922948E-01+I*(2.55571801816913E-01):c := 1.25832486099527E+00+I*(-4.85299456193908E-01):d := -1.11129735874056E+00+I*(9.88278566113484E-02):e := -3.84304733488176E-01+I*(1.66391472107448E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78645420559986E-01+I*(4.30492818960438E-01):b := -7.82420482584229E-01+I*(-8.23631216944749E-02):c := 1.11961932136255E+00+I*(-2.19169168448951E-01):d := -1.16627484495199E+00+I*(4.40954290115341E-02):e := -4.75659947695780E-01+I*(2.13640325658891E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.76854664765997E-01+I*(1.37645151882439E-01):b := -6.44415586724337E-01+I*(-4.07705976949492E-01):c := 8.42299461972317E-01+I*(-1.04459742647070E-01):d := -1.17320871645169E+00+I*(-3.31708899581396E-02):e := -6.21351892695436E-01+I*(1.54476058919729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.63721718164376E-01+I*(-8.78402517993696E-02):b := -3.29571346869686E-01+I*(-5.68225226191240E-01):c := 5.56126327100183E-01+I*(-1.94844993974226E-01):d := -1.12885453770354E+00+I*(-9.68173309322798E-02):e := -6.23356954721850E-01+I*(-3.37718369483978E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.51809409674055E-01+I*(-1.40456265711148E-01):b := 1.47931180477684E-02+I*(-4.88812128726764E-01):c := 3.95003507012948E-01+I*(-4.48032658814269E-01):d := -1.05396612188559E+00+I*(-1.17063016827686E-01):e := -4.90598928067608E-01+I*(-9.69952944279370E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.51621089035435E-01+I*(2.15924653561314E-01):b := 3.25781547471018E-01+I*(-1.43103687286743E-01):c := 6.36316549770766E-01+I*(-7.02387166288015E-01):d := -9.71559663492022E-01+I*(-3.91025144733540E-01):e := -3.91165025377363E-01+I*(4.70289387228781E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.05346365010728E+00+I*(4.90498970775557E-01):b := 3.07373175183452E-01+I*(2.09819047283459E-01):c := 8.57679040983591E-01+I*(-9.05027745304335E-01):d := -9.38617318122026E-01+I*(-3.20790078686575E-01):e := -3.32490541432253E-01+I*(7.01237195391423E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.54986609045917E-01+I*(7.66298237096443E-01):b := 6.64171829272796E-02+I*(4.68340873330372E-01):c := 1.15750740070355E+00+I*(-9.17970368209249E-01):d := -9.58528247728539E-01+I*(-2.45811965191355E-01):e := -2.98752315418962E-01+I*(1.08172537220315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.02268467814356E-01+I*(9.14272910645011E-01):b := -2.84340442593275E-01+I*(5.11496555296588E-01):c := 1.39550860719662E+00+I*(-7.35159037904317E-01):d := -1.02197590706334E+00+I*(-2.01173896841204E-01):e := -2.83693423119809E-01+I*(1.54078603071907E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.13558853344132E-01+I*(8.65183997112576E-01):b := -5.80776310160360E-01+I*(3.19093069968133E-01):c := 1.46031925085593E+00+I*(-4.42133207560841E-01):d := -1.09927243118149E+00+I*(-2.07762521914029E-01):e := -2.89396378846175E-01+I*(2.07965611902158E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.23948202895817E-01+I*(6.42000744703469E-01):b := -6.84184782821642E-01+I*(-1.88418535432552E-02):c := 1.32161371122321E+00+I*(-1.76002919815884E-01):d := -1.15424991739293E+00+I*(-2.62494949513843E-01):e := -3.31073634791538E-01+I*(2.65768008757944E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.22157447101828E-01+I*(3.49153077625469E-01):b := -5.46179886961749E-01+I*(-3.44184708798272E-01):c := 1.04429385183297E+00+I*(-6.12934940140028E-02):d := -1.16118378889262E+00+I*(-3.39761268483517E-01):e := -4.32638855695955E-01+I*(2.87574038368647E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.09024500500206E-01+I*(1.23667673943661E-01):b := -2.31335647107099E-01+I*(-5.04703958040020E-01):c := 7.58120716960839E-01+I*(-1.51678745341159E-01):d := -1.11682961014447E+00+I*(-4.03407709457658E-01):e := -5.25811766204187E-01+I*(1.87673799673614E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.97112192009885E-01+I*(7.10516600318826E-02):b := 1.13028817810356E-01+I*(-4.25290860575545E-01):c := 5.96997896873604E-01+I*(-4.04866410181202E-01):d := -1.04194119432652E+00+I*(-4.23653395353064E-01):e := -4.77728870884345E-01+I*(7.01594246172596E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.97161471059710E-01+I*(2.78511669984874E-01):b := 3.60203775270873E-01+I*(-3.12988821633527E-02):c := 7.63306499886746E-01+I*(-5.39480410363741E-01):d := -7.65275537991270E-01+I*(-6.18157526074302E-01):e := -3.98248321310131E-01+I*(1.64698150764809E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.99004032131556E-01+I*(5.53085987199117E-01):b := 3.41795402983307E-01+I*(3.21623852406849E-01):c := 9.84668991099571E-01+I*(-7.42120989380060E-01):d := -7.32333192621274E-01+I*(-5.47922460027337E-01):e := -3.25692091936252E-01+I*(1.54940425756150E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.00526991070192E-01+I*(8.28885253520003E-01):b := 1.00839410727134E-01+I*(5.80145678453762E-01):c := 1.28449735081953E+00+I*(-7.55063612284974E-01):d := -7.52244122227787E-01+I*(-4.72944346532116E-01):e := -2.74417329753836E-01+I*(1.75823575688816E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.47808849838631E-01+I*(9.76859927068571E-01):b := -2.49918214793421E-01+I*(6.23301360419978E-01):c := 1.52249855731260E+00+I*(-5.72252281980042E-01):d := -8.15691781562588E-01+I*(-4.28306278181966E-01):e := -2.40458696194935E-01+I*(2.11345201824442E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.59099235368407E-01+I*(9.27771013536136E-01):b := -5.46354082360505E-01+I*(4.30897875091523E-01):c := 1.58730920097191E+00+I*(-2.79226451636566E-01):d := -8.92988305680736E-01+I*(-4.34894903254791E-01):e := -2.22424378045249E-01+I*(2.59638440630374E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.05114150799087E-02+I*(7.04587761127029E-01):b := -6.49762555021787E-01+I*(9.29629515801349E-02):c := 1.44860366133919E+00+I*(-1.30961638916089E-02):d := -9.47965791892173E-01+I*(-4.89627330854606E-01):e := -2.29318796485786E-01+I*(3.23059850862560E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.23021708738973E-02+I*(4.11740094049030E-01):b := -5.11757659161895E-01+I*(-2.32379903674882E-01):c := 1.17128380194895E+00+I*(1.01613261910272E-01):d := -9.54899663391869E-01+I*(-5.66893649824279E-01):e := -2.90369903031186E-01+I*(3.90219760057537E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.54564882524481E-01+I*(1.86254690367221E-01):b := -1.96913419307244E-01+I*(-3.92899152916630E-01):c := 8.85110667076819E-01+I*(1.12280105831158E-02):d := -9.10545484643717E-01+I*(-6.30540090798420E-01):e := -4.19506536761412E-01+I*(3.79432074017548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.42652574034160E-01+I*(1.33638676455442E-01):b := 1.47451045610210E-01+I*(-3.13486055452155E-01):c := 7.23987846989584E-01+I*(-2.41959654256927E-01):d := -8.35657068825767E-01+I*(-6.50785776693826E-01):e := -4.67059973403463E-01+I*(2.46951710574315E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.62003936026915E-01+I*(1.62892616527172E-01):b := 3.14705988159993E-01+I*(7.64747490429748E-02):c := 7.55872001262695E-01+I*(-3.33059028752146E-01):d := -4.61254849463321E-01+I*(-6.59554144705867E-01):e := -4.37273455200788E-01+I*(3.22518029200199E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.63846497098762E-01+I*(4.37466933741415E-01):b := 2.96297615872427E-01+I*(4.29397483613177E-01):c := 9.77234492475520E-01+I*(-5.35699607768465E-01):d := -4.28312504093325E-01+I*(-5.89319078658901E-01):e := -3.44759308055829E-01+I*(2.61621917788729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.65369456037397E-01+I*(7.13266200062301E-01):b := 5.53416236162547E-02+I*(6.87919309660090E-01):c := 1.27706285219548E+00+I*(-5.48642230673379E-01):d := -4.48223433699838E-01+I*(-5.14340965163681E-01):e := -2.68544922408114E-01+I*(2.60234721163296E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.12651314805837E-01+I*(8.61240873610869E-01):b := -2.95416001904300E-01+I*(7.31074991626305E-01):c := 1.51506405868855E+00+I*(-3.65830900368448E-01):d := -5.11671093034639E-01+I*(-4.69702896813531E-01):e := -2.11024033822739E-01+I*(2.84334118444438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.60582996643882E-02+I*(8.12151960078434E-01):b := -5.91851869471384E-01+I*(5.38671506297850E-01):c := 1.57987470234786E+00+I*(-7.28050700249713E-02):d := -5.88967617152787E-01+I*(-4.76291521886356E-01):e := -1.66924439710029E-01+I*(3.26759993414922E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65668950112703E-01+I*(5.88968707669327E-01):b := -6.95260342132667E-01+I*(2.00736582786462E-01):c := 1.44116916271514E+00+I*(1.93325217719985E-01):d := -6.43945103364224E-01+I*(-5.31023949486170E-01):e := -1.38475955650301E-01+I*(3.92896421921463E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.67459705906692E-01+I*(2.96121040591328E-01):b := -5.57255446272774E-01+I*(-1.24606272468554E-01):c := 1.16384930332490E+00+I*(3.08034643521866E-01):d := -6.50878974863920E-01+I*(-6.08290268455844E-01):e := -1.50075856197823E-01+I*(4.93423953530282E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.05926525083138E-02+I*(7.06356369095190E-02):b := -2.42411206418124E-01+I*(-2.85125521710302E-01):c := 8.77676168452768E-01+I*(2.17649392194710E-01):d := -6.06524796115768E-01+I*(-6.71936709429984E-01):e := -2.75008685225239E-01+I*(5.90548793827042E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.07495039001365E-01+I*(1.80196229977404E-02):b := 1.01953258499331E-01+I*(-2.05712424245827E-01):c := 7.16553348365533E-01+I*(-3.55382726453325E-02):d := -5.31636380297818E-01+I*(-6.92182395325390E-01):e := -4.57215771073687E-01+I*(4.93532226957301E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56181308063783E-01+I*(-7.68330667362858E-02):b := 2.10577106379140E-01+I*(1.29788726520307E-01):c := 6.17491738430056E-01+I*(-1.79709880027414E-01):d := -2.01752256883991E-01+I*(-4.95845062698356E-01):e := -6.06847379007797E-01+I*(5.94424730188218E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.58023869135629E-01+I*(1.97741250477957E-01):b := 1.92168734091574E-01+I*(4.82711461090509E-01):c := 8.38854229642881E-01+I*(-3.82350459043733E-01):d := -1.68809911513995E-01+I*(-4.25609996651391E-01):e := -4.42375874362172E-01+I*(4.15705997591447E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59546828074265E-01+I*(4.73540516798843E-01):b := -4.87872581645983E-02+I*(7.41233287137422E-01):c := 1.13868258936284E+00+I*(-3.95293081948647E-01):d := -1.88720841120508E-01+I*(-3.50631883156170E-01):e := -3.06690245645279E-01+I*(3.81448137602671E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.06828686842704E-01+I*(6.21515190347412E-01):b := -3.99544883685153E-01+I*(7.84388969103638E-01):c := 1.37668379585591E+00+I*(-2.12481751643716E-01):d := -2.52168500455309E-01+I*(-3.05993814806020E-01):e := -2.05129429493646E-01+I*(3.93200178268755E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.81880927627520E-01+I*(5.72426276814977E-01):b := -6.95980751252238E-01+I*(5.91985483775183E-01):c := 1.44149443951522E+00+I*(8.05440786997606E-02):d := -3.29465024573457E-01+I*(-3.12582439878845E-01):e := -1.19502346895346E-01+I*(4.30126114527079E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.71491578075836E-01+I*(3.49243024405870E-01):b := -7.99389223913520E-01+I*(2.54050560263795E-01):c := 1.30278889988250E+00+I*(3.46674366444718E-01):d := -3.84442510784894E-01+I*(-3.67314867478660E-01):e := -3.93793926467134E-02+I*(4.98069645488859E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.73282333869824E-01+I*(5.63953573278701E-02):b := -6.61384328053627E-01+I*(-7.12922949912226E-02):c := 1.02546904049226E+00+I*(4.61383792246599E-01):d := -3.91376382284590E-01+I*(-4.44581186448334E-01):e := 3.01164535976132E-02+I*(6.28933095831191E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86415280471446E-01+I*(-1.69090046353938E-01):b := -3.46540088198977E-01+I*(-2.31811544232970E-01):c := 7.39295905620129E-01+I*(3.70998540919442E-01):d := -3.47022203536438E-01+I*(-5.08227627422474E-01):e := -6.22510273732927E-03+I*(8.90528526664034E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01672411038233E-01+I*(-2.21706060265717E-01):b := -2.17562328152226E-03+I*(-1.52398446768495E-01):c := 5.78173085532893E-01+I*(1.17810876079400E-01):d := -2.72133787718488E-01+I*(-5.28473313317880E-01):e := -4.55594243532801E-01+I*(1.01185767830860E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.29209170881769E-01+I*(-3.28495068352327E-01):b := 9.65401909771881E-02+I*(1.03696847688140E-01):c := 4.12915374293532E-01+I*(-1.51186735163794E-01):d := -1.08191907371213E-01+I*(-2.03631578946866E-01):e := -1.65369118152656E+00+I*(6.52363079698547E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.31051731953615E-01+I*(-5.39207511380837E-02):b := 7.81318186896224E-02+I*(4.56619582258342E-01):c := 6.34277865506358E-01+I*(-3.53827314180114E-01):d := -7.52495620012164E-02+I*(-1.33396512899901E-01):e := -8.48701567372478E-01+I*(4.91047006279598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.32574690892251E-01+I*(2.21878515182802E-01):b := -1.62824173566550E-01+I*(7.15141408305256E-01):c := 9.34106225226313E-01+I*(-3.66769937085028E-01):d := -9.51604916077296E-02+I*(-5.84183994046809E-02):e := -5.12805704148276E-01+I*(5.19426956737341E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.79856549660690E-01+I*(3.69853188731371E-01):b := -5.13581799087105E-01+I*(7.58297090271471E-01):c := 1.17210743171939E+00+I*(-1.83958606780095E-01):d := -1.58608150942531E-01+I*(-1.37803310545308E-02):e := -2.97793447053540E-01+I*(5.67390126244414E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08853064809535E-01+I*(3.20764275198936E-01):b := -8.10017666654190E-01+I*(5.65893604943016E-01):c := 1.23691807537869E+00+I*(1.09067223563381E-01):d := -2.35904675060679E-01+I*(-2.03689561273561E-02):e := -1.14889022857032E-01+I*(6.27919960269946E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.98463715257850E-01+I*(9.75810227898286E-02):b := -9.13426139315472E-01+I*(2.27958681431628E-01):c := 1.09821253574597E+00+I*(3.75197511308337E-01):d := -2.90882161272116E-01+I*(-7.51013837271705E-02):e := 8.31145932955398E-02+I*(7.16068211465745E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.00254471051839E-01+I*(-1.95266644288171E-01):b := -7.75421243455579E-01+I*(-9.73841738233888E-02):c := 8.20892676355739E-01+I*(4.89906937110219E-01):d := -2.97816032771811E-01+I*(-1.52367702696844E-01):e := 3.59838579496458E-01+I*(8.85780609718829E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13387417653461E-01+I*(-4.20752047969980E-01):b := -4.60577003600929E-01+I*(-2.57903423065136E-01):c := 5.34719541483606E-01+I*(3.99521685783062E-01):d := -2.53461854023660E-01+I*(-2.16014143670984E-01):e := 8.81292109118103E-01+I*(1.43792261784437E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.74700273856219E-01+I*(-4.73368061881758E-01):b := -1.16212538683474E-01+I*(-1.78490325600661E-01):c := 3.73596721396370E-01+I*(1.46334020943020E-01):d := -1.78573438205710E-01+I*(-2.36259829566390E-01):e := -1.17480795766170E+00+I*(4.59254821779029E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.46916975854047E-01+I*(-4.74337940853205E-01):b := 2.59543820498528E-02+I*(1.04077926309790E-02):c := 2.37866463245635E-01+I*(-2.60835890642420E-01):d := -2.24351728269476E-01+I*(8.03563699101564E-02):e := -9.95918964609121E-01+I*(-6.92702108388337E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.48759536925894E-01+I*(-1.99763623638962E-01):b := 7.54600976228717E-03+I*(3.63330527201181E-01):c := 4.59228954458460E-01+I*(-4.63476469658739E-01):d := -1.91409382899480E-01+I*(1.50591435957122E-01):e := -9.40814910431988E-01+I*(-1.51045951456816E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.50282495864529E-01+I*(7.60356426819237E-02):b := -2.33409982493885E-01+I*(6.21852353248094E-01):c := 7.59057314178415E-01+I*(-4.76419092563653E-01):d := -2.11320312505993E-01+I*(2.25569549452342E-01):e := -8.36503802463627E-01+I*(2.23252906315147E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.97564354632968E-01+I*(2.24010316230492E-01):b := -5.84167608014440E-01+I*(6.65008035214310E-01):c := 9.97058520671489E-01+I*(-2.93607762258721E-01):d := -2.74767971840794E-01+I*(2.70207617802492E-01):e := -6.92590190962926E-01+I*(5.55455927254038E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08854740162744E-01+I*(1.74921402698057E-01):b := -8.80603475581525E-01+I*(4.72604549885855E-01):c := 1.06186916433080E+00+I*(-5.81931915245289E-04):d := -3.52064495958942E-01+I*(2.63618992729667E-01):e := -4.65249547458669E-01+I*(9.23104784252723E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.07559102855714E-02+I*(-4.82618497110501E-02):b := -9.84011948242807E-01+I*(1.34669626374467E-01):c := 9.23163624698077E-01+I*(2.65548355829712E-01):d := -4.07041982170379E-01+I*(2.08886565129852E-01):e := 1.32267028995385E-02+I*(1.42673681056561E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.25466660795604E-02+I*(-3.41109516789049E-01):b := -8.46007052382914E-01+I*(-1.90673228880550E-01):c := 6.45843765307842E-01+I*(3.80257781631593E-01):d := -4.13975853670075E-01+I*(1.31620246160179E-01):e := 1.68077219124037E+00+I*(2.04253875379691E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.04320387318818E-01+I*(-5.66594920470858E-01):b := -5.31162812528264E-01+I*(-3.51192478122298E-01):c := 3.59670630435708E-01+I*(2.89872530304437E-01):d := -3.69621674921923E-01+I*(6.79738051860387E-02):e := 2.90191715363246E+00+I*(-3.18323967161403E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.92408078828497E-01+I*(-6.19210934382637E-01):b := -1.86798347610809E-01+I*(-2.71779380657823E-01):c := 1.98547810348473E-01+I*(3.66848654643940E-02):d := -2.94733259103973E-01+I*(4.77281192906325E-02):e := -7.73959022439948E-01+I*(-1.77852332924055E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.07436821481350E-01+I*(-4.46120183332779E-01):b := 3.18475640681186E-02+I*(-1.06427452997572E-01):c := 1.74252336217618E-01+I*(-4.57351288000219E-01):d := -4.95879248407875E-01+I*(2.23237666428024E-01):e := -5.33380979022740E-01+I*(-3.86424924758954E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00927938255320E+00+I*(-1.71545866118536E-01):b := 1.34391917805527E-02+I*(2.46495281572630E-01):c := 3.95614827430444E-01+I*(-6.59991867016539E-01):d := -4.62936903037879E-01+I*(2.93472732474989E-01):e := -5.53891820676825E-01+I*(-2.04417946450234E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.10802341491832E-01+I*(1.04253400202351E-01):b := -2.27516800475620E-01+I*(5.05017107619543E-01):c := 6.95443187150399E-01+I*(-6.72934489921453E-01):d := -4.82847832644392E-01+I*(3.68450845970209E-01):e := -5.96054947740914E-01+I*(-4.36586105224335E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.58084200260271E-01+I*(2.52228073750919E-01):b := -5.78274425996175E-01+I*(5.48172789585758E-01):c := 9.33444393643472E-01+I*(-4.90123159616521E-01):d := -5.46295491979193E-01+I*(4.13088914320359E-01):e := -6.72013608238353E-01+I*(1.33625287242081E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69374585790046E-01+I*(2.03139160218484E-01):b := -8.74710293563259E-01+I*(3.55769304257304E-01):c := 9.98255037302780E-01+I*(-1.97097329273045E-01):d := -6.23592016097341E-01+I*(4.06500289247534E-01):e := -8.42116115459274E-01+I*(3.78200414188854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.79763935341731E-01+I*(-2.00440921906231E-02):b := -9.78118766224542E-01+I*(1.78343807459154E-02):c := 8.59549497670061E-01+I*(6.90329584719125E-02):d := -6.78569502308778E-01+I*(3.51767861647720E-01):e := -1.44802807677027E+00+I*(7.44242467110396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.77973179547742E-01+I*(-3.12891759268623E-01):b := -8.40113870364649E-01+I*(-3.07508474509102E-01):c := 5.82229638279825E-01+I*(1.83742384273794E-01):d := -6.85503373808474E-01+I*(2.74501542678046E-01):e := -2.73892840661591E+00+I*(-1.12291844583499E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64840232946120E-01+I*(-5.38377162950431E-01):b := -5.25269630509998E-01+I*(-4.68027723750850E-01):c := 2.96056503407692E-01+I*(9.33571329466374E-02):d := -6.41149195060322E-01+I*(2.10855101703906E-01):e := -7.81591949273427E-01+I*(-1.16659376882348E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.52927924455799E-01+I*(-5.90993176862210E-01):b := -1.80905165592544E-01+I*(-3.88614626286374E-01):c := 1.34933683320456E-01+I*(-1.59830531893405E-01):d := -5.66260779242372E-01+I*(1.90609415808500E-01):e := -5.52671835105521E-01+I*(-6.50528649897117E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.51660785430594E-01+I*(-1.81145042373421E-02):b := 9.31395329281501E-02+I*(-4.56701664636517E-01):c := 2.23827095580131E-01+I*(7.82956514418539E-03):d := -5.37745026510544E-01+I*(-2.41627455501933E-01):e := -5.89962588158554E-01+I*(1.21546436771191E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.53503346502440E-01+I*(2.56459812976901E-01):b := 7.47311606405844E-02+I*(-1.03778930066315E-01):c := 4.45189586792956E-01+I*(-1.94811013872134E-01):d := -5.04802681140548E-01+I*(-1.71392389454967E-01):e := -4.56340339676675E-01+I*(1.46940184902385E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.55026305441076E-01+I*(5.32259079297787E-01):b := -1.66224831615588E-01+I*(1.54742895980598E-01):c := 7.45017946512911E-01+I*(-2.07753636777048E-01):d := -5.24713610747061E-01+I*(-9.64142759597472E-02):e := -3.76663547783340E-01+I*(2.01261254977116E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.02308164209515E-01+I*(6.80233752846355E-01):b := -5.16982457136143E-01+I*(1.97898577946813E-01):c := 9.83019153005984E-01+I*(-2.49423064721159E-02):d := -5.88161270081862E-01+I*(-5.17762076095971E-02):e := -3.25103320092241E-01+I*(2.68620457104761E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.13598549739290E-01+I*(6.31144839313920E-01):b := -8.13418324703227E-01+I*(5.49509261835809E-03):c := 1.04782979666529E+00+I*(2.68083523871361E-01):d := -6.65457794200010E-01+I*(-5.83648326824222E-02):e := -2.94317780595240E-01+I*(3.54866425333449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.23987899290975E-01+I*(4.07961586904813E-01):b := -9.16826797364509E-01+I*(-3.32439830893030E-01):c := 9.09124257032572E-01+I*(5.34213811616317E-01):d := -7.20435280411447E-01+I*(-1.13097260282236E-01):e := -2.98497112883742E-01+I*(4.76979674226450E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22197143496986E-01+I*(1.15113919826813E-01):b := -7.78821901504616E-01+I*(-6.57782686148046E-01):c := 6.31804397642337E-01+I*(6.48923237418199E-01):d := -7.27369151911143E-01+I*(-1.90363579251910E-01):e := -4.15267967528406E-01+I*(6.42807397111086E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.09064196895365E-01+I*(-1.10371483854995E-01):b := -4.63977661649966E-01+I*(-8.18301935389794E-01):c := 3.45631262770204E-01+I*(5.58537986091042E-01):d := -6.83014973162992E-01+I*(-2.54010020226050E-01):e := -7.69216635610816E-01+I*(6.15186545086407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.97151888405044E-01+I*(-1.62987497766773E-01):b := -1.19613196732512E-01+I*(-7.38888837925319E-01):c := 1.84508442682968E-01+I*(3.05350321250999E-01):d := -6.08126557345041E-01+I*(-2.74255706121456E-01):e := -7.99371575065268E-01+I*(2.30424931147180E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.69110515491110E-01+I*(2.43347421721238E-01):b := 2.09223128966365E-01+I*(-4.71186240785683E-01):c := 4.06310505252079E-01+I*(-8.89426609887829E-02):d := -7.25605894140230E-01+I*(-4.84218785727390E-01):e := -4.09803917285997E-01+I*(1.54742760209210E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.70953076562956E-01+I*(5.17921738935481E-01):b := 1.90814756678799E-01+I*(-1.18263506215481E-01):c := 6.27672996464904E-01+I*(-2.91583240005102E-01):d := -6.92663548770233E-01+I*(-4.13983719680425E-01):e := -3.34489010827909E-01+I*(1.48903194368087E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.72476035501592E-01+I*(7.93721005256367E-01):b := -5.01412355773738E-02+I*(1.40258319831431E-01):c := 9.27501356184859E-01+I*(-3.04525862910016E-01):d := -7.12574478376747E-01+I*(-3.39005606185205E-01):e := -2.82625486827788E-01+I*(1.72868520088940E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.19757894270031E-01+I*(9.41695678804935E-01):b := -4.00898861097928E-01+I*(1.83414001797647E-01):c := 1.16550256267793E+00+I*(-1.21714532605084E-01):d := -7.76022137711548E-01+I*(-2.94367537835055E-01):e := -2.48891804720728E-01+I*(2.11007051636931E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.31048279799806E-01+I*(8.92606765272501E-01):b := -6.97334728665013E-01+I*(-8.98948353080826E-03):c := 1.23031320633724E+00+I*(1.71311297738393E-01):d := -8.53318661829696E-01+I*(-3.00956162907880E-01):e := -2.31799405755564E-01+I*(2.61977929014536E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.41437629351491E-01+I*(6.69423512863393E-01):b := -8.00743201326295E-01+I*(-3.46924407042196E-01):c := 1.09160766670452E+00+I*(4.37441585483349E-01):d := -9.08296148041133E-01+I*(-3.55688590507694E-01):e := -2.41193715221049E-01+I*(3.28456742089864E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.39646873557502E-01+I*(3.76575845785394E-01):b := -6.62738305466402E-01+I*(-6.72267262297213E-01):c := 8.14287807314285E-01+I*(5.52151011285230E-01):d := -9.15230019540829E-01+I*(-4.32954909477368E-01):e := -3.08760195212955E-01+I*(3.97504000152908E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.26513926955881E-01+I*(1.51090442103585E-01):b := -3.47894065611752E-01+I*(-8.32786511538960E-01):c := 5.28114672442152E-01+I*(4.61765759958073E-01):d := -8.70875840792677E-01+I*(-4.96601350451508E-01):e := -4.46247709520943E-01+I*(3.78755909801216E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.14601618465560E-01+I*(9.84744281918068E-02):b := -3.52960069429748E-03+I*(-7.53373414074485E-01):c := 3.66991852354916E-01+I*(2.08578095118031E-01):d := -7.95987424974727E-01+I*(-5.16847036346914E-01):e := -4.87005810254545E-01+I*(2.35322887771843E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.14413297826940E-01+I*(4.54855347464269E-01):b := 3.07458828728952E-01+I*(-4.07664972634464E-01):c := 6.08304895112735E-01+I*(-4.57764123557154E-02):d := -7.13580966581160E-01+I*(-7.90809164252769E-01):e := -3.09721144373697E-01+I*(2.08311788594629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.16255858898786E-01+I*(7.29429664678512E-01):b := 2.89050456441386E-01+I*(-5.47422380642621E-02):c := 8.29667386325560E-01+I*(-2.48416991372035E-01):d := -6.80638621211164E-01+I*(-7.20574098205803E-01):e := -2.60657217723910E-01+I*(1.81625089041697E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.17778817837421E-01+I*(1.00522893099940E+00):b := 4.80944641852139E-02+I*(2.03779587982650E-01):c := 1.12949574604552E+00+I*(-2.61359614276949E-01):d := -7.00549550817677E-01+I*(-6.45595984710583E-01):e := -2.18002206140135E-01+I*(1.85362625994924E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.65060676605861E-01+I*(1.15320360454797E+00):b := -3.02663161335341E-01+I*(2.46935269948866E-01):c := 1.36749695253859E+00+I*(-7.85482839720171E-02):d := -7.63997210152478E-01+I*(-6.00957916360432E-01):e := -1.86357756629087E-01+I*(2.05226654981188E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.76351062135636E-01+I*(1.10411469101553E+00):b := -5.99099028902425E-01+I*(5.45317846204112E-02):c := 1.43230759619790E+00+I*(2.14477546371459E-01):d := -8.41293734270627E-01+I*(-6.07546541433257E-01):e := -1.66048598385180E-01+I*(2.37100767459643E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32595883126794E-02+I*(8.80931438606423E-01):b := -7.02507501563707E-01+I*(-2.83403138890977E-01):c := 1.29360205656518E+00+I*(4.80607834116416E-01):d := -8.96271220482064E-01+I*(-6.62278969033072E-01):e := -1.62388849262770E-01+I*(2.81223519048589E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.50503441066680E-02+I*(5.88083771528424E-01):b := -5.64502605703814E-01+I*(-6.08745994145993E-01):c := 1.01628219717494E+00+I*(5.95317259918298E-01):d := -9.03205091981759E-01+I*(-7.39545288002746E-01):e := -1.91976834245683E-01+I*(3.31850500851748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71816709291711E-01+I*(3.62598367846615E-01):b := -2.49658365849164E-01+I*(-7.69265243387741E-01):c := 7.30109062302807E-01+I*(5.04932008591141E-01):d := -8.58850913233608E-01+I*(-8.03191728976886E-01):e := -2.69813887993821E-01+I*(3.48306409007342E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.59904400801390E-01+I*(3.09982353934837E-01):b := 9.47060990682901E-02+I*(-6.89852145923266E-01):c := 5.68986242215572E-01+I*(2.51744343751098E-01):d := -7.83962497415658E-01+I*(-8.23437414872292E-01):e := -3.30628286682972E-01+I*(2.81764146837408E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.59953679851214E-01+I*(5.17442363887829E-01):b := 3.41881056528807E-01+I*(-2.95860167511074E-01):c := 7.35294845228715E-01+I*(1.17130343568560E-01):d := -5.07296841080408E-01+I*(-1.01794154559353E+00):e := -2.38832467594489E-01+I*(2.68786648145620E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.61796240923061E-01+I*(7.92016681102073E-01):b := 3.23472684241241E-01+I*(5.70625670591284E-02):c := 9.56657336441541E-01+I*(-8.55102354477598E-02):d := -4.74354495710413E-01+I*(-9.47706479546566E-01):e := -2.09172275565166E-01+I*(2.25904837755082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.63319199861696E-01+I*(1.06781594742296E+00):b := 8.25166919850688E-02+I*(3.15584393106041E-01):c := 1.25648569616150E+00+I*(-9.84528583526736E-02):d := -4.94265425316925E-01+I*(-8.72728366051345E-01):e := -1.71448853338482E-01+I*(2.13510789885221E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.10601058630135E-01+I*(1.21579062097153E+00):b := -2.68240933535486E-01+I*(3.58740075072256E-01):c := 1.49448690265457E+00+I*(8.43584719522586E-02):d := -5.57713084651726E-01+I*(-8.28090297701196E-01):e := -1.38553328609744E-01+I*(2.20032005841928E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.81085558400901E-02+I*(1.16670170743909E+00):b := -5.64676801102570E-01+I*(1.66336589743801E-01):c := 1.55929754631388E+00+I*(3.77384302295735E-01):d := -6.35009608769874E-01+I*(-8.34678922774020E-01):e := -1.12847477613453E-01+I*(2.39859812224802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.67719206288406E-01+I*(9.43518455029983E-01):b := -6.68085273763853E-01+I*(-1.71598333767587E-01):c := 1.42059200668116E+00+I*(6.43514590040693E-01):d := -6.89987094981311E-01+I*(-8.89411350373835E-01):e := -9.76506428650514E-02+I*(2.72672693889520E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69509962082394E-01+I*(6.50670787951984E-01):b := -5.30080377903960E-01+I*(-4.96941189022603E-01):c := 1.14327214729092E+00+I*(7.58224015842574E-01):d := -6.96920966481007E-01+I*(-9.66677669343508E-01):e := -1.04065509606277E-01+I*(3.17843259131941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.26429086840148E-02+I*(4.25185384270175E-01):b := -2.15236138049309E-01+I*(-6.57460438264351E-01):c := 8.57099012418787E-01+I*(6.67838764515416E-01):d := -6.52566787732855E-01+I*(-1.03032411031765E+00):e := -1.51733541033348E-01+I*(3.55793162407697E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.05444782825665E-01+I*(3.72569370358397E-01):b := 1.29128326868145E-01+I*(-5.78047340799876E-01):c := 6.95976192331552E-01+I*(4.14651099675373E-01):d := -5.77678371914905E-01+I*(-1.05056979621305E+00):e := -2.21703465483041E-01+I*(3.34564547915107E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24796144818420E-01+I*(4.01823310430126E-01):b := 2.96383269417928E-01+I*(-1.88086536304746E-01):c := 7.27860346604663E-01+I*(3.23551725180154E-01):d := -2.03276152552459E-01+I*(-1.05933816422510E+00):e := -1.78826965703897E-01+I*(3.45012449249641E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.26638705890267E-01+I*(6.76397627644370E-01):b := 2.77974897130362E-01+I*(1.64836198265456E-01):c := 9.49222837817489E-01+I*(1.20911146163834E-01):d := -1.70333807182463E-01+I*(-9.89103098178130E-01):e := -1.69899906666719E-01+I*(2.84950072519425E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.28161664828902E-01+I*(9.52196893965255E-01):b := 3.70189048741899E-02+I*(4.23358024312368E-01):c := 1.24905119753744E+00+I*(1.07968523258920E-01):d := -1.90244736788976E-01+I*(-9.14124984682909E-01):e := -1.35767404870934E-01+I*(2.55337365456762E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.45564764026588E-02+I*(1.10017156751382E+00):b := -3.13738720646365E-01+I*(4.66513706278583E-01):c := 1.48705240403052E+00+I*(2.90779853563853E-01):d := -2.53692396123777E-01+I*(-8.69486916332759E-01):e := -9.97709770573105E-02+I*(2.49043523428786E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.13266090872883E-01+I*(1.05108265398139E+00):b := -6.10174588213449E-01+I*(2.74110220950128E-01):c := 1.55186304768982E+00+I*(5.83805683907329E-01):d := -3.30988920241926E-01+I*(-8.76075541405584E-01):e := -6.74065947768638E-02+I*(2.58743327675870E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.02876741321198E-01+I*(8.27899401572282E-01):b := -7.13583060874731E-01+I*(-6.38247025612593E-02):c := 1.41315750805711E+00+I*(8.49935971652286E-01):d := -3.85966406453363E-01+I*(-9.30807969005399E-01):e := -4.10760283431835E-02+I*(2.83382573229910E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.04667497115187E-01+I*(5.35051734494283E-01):b := -5.75578165014839E-01+I*(-3.89167557816276E-01):c := 1.13583764866687E+00+I*(9.64645397454167E-01):d := -3.92900277953059E-01+I*(-1.00807428797507E+00):e := -2.85611304321602E-02+I*(3.25658614889497E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.17800443716809E-01+I*(3.09566330812473E-01):b := -2.60733925160188E-01+I*(-5.49686807058023E-01):c := 8.49664513794737E-01+I*(8.74260146127010E-01):d := -3.48546099204906E-01+I*(-1.07172072894921E+00):e := -5.16335887226551E-02+I*(3.80014486256083E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.97127522071297E-02+I*(2.56950316900695E-01):b := 8.36305397572659E-02+I*(-4.70273709593548E-01):c := 6.88541693707501E-01+I*(6.21072481286967E-01):d := -2.73657683386956E-01+I*(-1.09196641484462E+00):e := -1.24707128711810E-01+I*(3.99132074729989E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.18973516855288E-01+I*(1.62097627166669E-01):b := 1.92254387637075E-01+I*(-1.34772558827414E-01):c := 5.89480083772024E-01+I*(4.76900873904886E-01):d := 5.62264400268709E-02+I*(-8.95629082217584E-01):e := -1.24770030771224E-01+I*(4.62370507427402E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20816077927134E-01+I*(4.36671944380912E-01):b := 1.73846015349509E-01+I*(2.18150175742788E-01):c := 8.10842574984850E-01+I*(2.74260294888567E-01):d := 8.91687853968674E-02+I*(-8.25394016170619E-01):e := -1.45722709659689E-01+I*(3.74237727263917E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.22339036865770E-01+I*(7.12471210701798E-01):b := -6.71099769066631E-02+I*(4.76672001789701E-01):c := 1.11067093470480E+00+I*(2.61317671983653E-01):d := 6.92578557903538E-02+I*(-7.50415902675399E-01):e := -1.12756006726044E-01+I*(3.19316098261669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.30379104365791E-01+I*(8.60445884250366E-01):b := -4.17867602427218E-01+I*(5.19827683755916E-01):c := 1.34867214119788E+00+I*(4.44129002288585E-01):d := 5.81019645555297E-03+I*(-7.05777834325249E-01):e := -6.94495221528941E-02+I*(2.97112712324596E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.19088718836016E-01+I*(8.11356970717932E-01):b := -7.14303469994302E-01+I*(3.27424198427462E-01):c := 1.41348278485719E+00+I*(7.37154832632061E-01):d := -7.14863276625953E-02+I*(-7.12366459398074E-01):e := -2.67442176347766E-02+I*(2.96045605241290E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.08699369284331E-01+I*(5.88173718308824E-01):b := -8.17711942655585E-01+I*(-1.05107250839264E-02):c := 1.27477724522447E+00+I*(1.00328512037702E+00):d := -1.26463813874033E-01+I*(-7.67098886997888E-01):e := 1.36753917259928E-02+I*(3.13128947191918E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.10490125078320E-01+I*(2.95326051230825E-01):b := -6.79707046795692E-01+I*(-3.35853580338943E-01):c := 9.97457385834231E-01+I*(1.11799454617890E+00):d := -1.33397685373728E-01+I*(-8.44365205967562E-01):e := 4.74488840602473E-02+I*(3.53528879353462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.23623071679941E-01+I*(6.98406475490157E-02):b := -3.64862806941041E-01+I*(-4.96372829580691E-01):c := 7.11284250962097E-01+I*(1.02760929485174E+00):d := -8.90435066255762E-02+I*(-9.08011646941702E-01):e := 5.31145229076423E-02+I*(4.25315951418930E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.35535380170262E-01+I*(1.72246336372374E-02):b := -2.04983420235872E-02+I*(-4.16959732116216E-01):c := 5.50161430874861E-01+I*(7.74421630011700E-01):d := -1.41550908076259E-02+I*(-9.28257332837108E-01):e := -1.79777539112937E-02+I*(4.95894101305371E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.92001379673274E-01+I*(-8.95643744493725E-02):b := 7.82174722351229E-02+I*(-1.60864437659580E-01):c := 3.84903719635501E-01+I*(5.05424018768506E-01):d := 1.49786789539649E-01+I*(-6.03415598466095E-01):e := -1.12738022465158E-01+I*(6.96738093901116E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.93843940745120E-01+I*(1.85009942764871E-01):b := 5.98090999475570E-02+I*(1.92058296910622E-01):c := 6.06266210848326E-01+I*(3.02783439752186E-01):d := 1.82729134909645E-01+I*(-5.33180532419129E-01):e := -1.80619646502035E-01+I*(5.25080689563101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.95366899683756E-01+I*(4.60809209085757E-01):b := -1.81146892308615E-01+I*(4.50580122957534E-01):c := 9.06094570568281E-01+I*(2.89840816847272E-01):d := 1.62818205303132E-01+I*(-4.58202418923909E-01):e := -1.29496902024474E-01+I*(4.21663174847798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.73512415478051E-02+I*(6.08783882634325E-01):b := -5.31904517829170E-01+I*(4.93735804923750E-01):c := 1.14409577706135E+00+I*(4.72652147152204E-01):d := 9.93705459683307E-02+I*(-4.13564350573759E-01):e := -6.28985157744536E-02+I*(3.78030772277608E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.46060856018030E-01+I*(5.59694969101890E-01):b := -8.28340385396254E-01+I*(3.01332319595295E-01):c := 1.20890642072066E+00+I*(7.65677977495681E-01):d := 2.20740218501828E-02+I*(-4.20152975646584E-01):e := 2.00992752445609E-03+I*(3.65862271497659E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.35671506466345E-01+I*(3.36511716692783E-01):b := -9.31748858057536E-01+I*(-3.66026039160928E-02):c := 1.07020088108794E+00+I*(1.03180826524064E+00):d := -3.29034643612545E-02+I*(-4.74885403246398E-01):e := 6.70485800777900E-02+I*(3.77160746196200E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.37462262260334E-01+I*(4.36640496147834E-02):b := -7.93743962197644E-01+I*(-3.61945459171109E-01):c := 7.92881021697707E-01+I*(1.14651769104252E+00):d := -3.98373358609498E-02+I*(-5.52151722216072E-01):e := 1.34155043687454E-01+I*(4.19827741837494E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.50595208861956E-01+I*(-1.81821354067025E-01):b := -4.78899722342993E-01+I*(-5.22464708412857E-01):c := 5.06707886825574E-01+I*(1.05613243971536E+00):d := 4.51684288720158E-03+I*(-6.15798163190212E-01):e := 1.86675533370336E-01+I*(5.22290353866305E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.25075173522762E-02+I*(-2.34437367978803E-01):b := -1.34535257425539E-01+I*(-4.43051610948382E-01):c := 3.45585066738338E-01+I*(8.02944774875319E-01):d := 7.94052587051520E-02+I*(-6.36043849085619E-01):e := 1.21713892913618E-01+I*(6.94707990734967E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.09709184645552E-01+I*(-2.35407246950251E-01):b := 7.63166330778747E-03+I*(-2.54153492716741E-01):c := 2.09854808587603E-01+I*(3.95774863289880E-01):d := 3.36269686413856E-02+I*(-3.19427649609072E-01):e := -5.71215078322845E-01+I*(1.08530347076268E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.11551745717398E-01+I*(3.91670702639926E-02):b := -1.07767089797784E-02+I*(9.87692418534607E-02):c := 4.31217299800429E-01+I*(1.93134284273561E-01):d := 6.65693140113820E-02+I*(-2.49192583562107E-01):e := -4.62355700969861E-01+I*(6.41621124980586E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.13074704656034E-01+I*(3.14966336584879E-01):b := -2.51732701235951E-01+I*(3.57291067900374E-01):c := 7.31045659520384E-01+I*(1.80191661368647E-01):d := 4.66583844048688E-02+I*(-1.74214470066887E-01):e := -2.83291489475439E-01+I*(5.15408045068139E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.60356563424473E-01+I*(4.62941010133447E-01):b := -6.02490326756505E-01+I*(4.00446749866589E-01):c := 9.69046866013457E-01+I*(3.63002991673579E-01):d := -1.67892749299324E-02+I*(-1.29576401716736E-01):e := -1.47768944416790E-01+I*(4.81855243081229E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.28353051045751E-01+I*(4.13852096601012E-01):b := -8.98926194323590E-01+I*(2.08043264538134E-01):c := 1.03385750967276E+00+I*(6.56028822017055E-01):d := -9.40857990480802E-02+I*(-1.36165026789561E-01):e := -3.25971501451849E-02+I*(4.84168775219191E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.17963701494066E-01+I*(1.90668844191904E-01):b := -1.00233466698487E+00+I*(-1.29891658973254E-01):c := 8.95151970040045E-01+I*(9.22159109762012E-01):d := -1.49063285259517E-01+I*(-1.90897454389376E-01):e := 8.25576098035747E-02+I*(5.15012770538673E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.19754457288056E-01+I*(-1.02178822886095E-01):b := -8.64329771124979E-01+I*(-4.55234514228271E-01):c := 6.17832110649809E-01+I*(1.03686853556389E+00):d := -1.55997156759213E-01+I*(-2.68163773359050E-01):e := 2.15629439516302E-01+I*(5.95747875885215E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32887403889677E-01+I*(-3.27664226567904E-01):b := -5.49485531270329E-01+I*(-6.15753763470018E-01):c := 3.31658975777676E-01+I*(9.46483284236736E-01):d := -1.11642978011061E-01+I*(-3.31810214333190E-01):e := 3.63487910467059E-01+I*(8.18309474001191E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.55200287620002E-01+I*(-3.80280240479682E-01):b := -2.05121066352874E-01+I*(-5.36340666005543E-01):c := 1.70536155690441E-01+I*(6.93295619396693E-01):d := -3.67545621931111E-02+I*(-3.52055900228596E-01):e := 1.73472930064060E-01+I*(1.36790511680470E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.70229030272854E-01+I*(-2.07189489429824E-01):b := 1.35248453260528E-02+I*(-3.70988738345293E-01):c := 1.46240681559587E-01+I*(1.99259465932080E-01):d := -2.37900551497013E-01+I*(-1.76546353091204E-01):e := -9.70881749382453E-01+I*(3.13859673460590E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.72071591344701E-01+I*(6.73848277844193E-02):b := -4.88352696151311E-03+I*(-1.80660037750908E-02):c := 3.67603172772412E-01+I*(-3.38111308423912E-03):d := -2.04958206127017E-01+I*(-1.06311287044239E-01):e := -6.34495822345633E-01+I*(2.97495918390809E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.73594550283336E-01+I*(3.43184094105305E-01):b := -2.45839519217685E-01+I*(2.40455822271822E-01):c := 6.67431532492367E-01+I*(-1.63237359891530E-02):d := -2.24869135733530E-01+I*(-3.13331735490188E-02):e := -4.53233774887149E-01+I*(3.53520928448916E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.20876409051775E-01+I*(4.91158767653874E-01):b := -5.96597144738240E-01+I*(2.83611504238037E-01):c := 9.05432738985440E-01+I*(1.66487594315779E-01):d := -2.88316795068332E-01+I*(1.33048948011313E-02):e := -3.27117014924698E-01+I*(4.25827869768990E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32166794581551E-01+I*(4.42069854121439E-01):b := -8.93033012305325E-01+I*(9.12080189095826E-02):c := 9.70243382644749E-01+I*(4.59513424659256E-01):d := -3.65613319186480E-01+I*(6.71626972830616E-03):e := -2.19132585793459E-01+I*(5.18660377527204E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.74438558667645E-02+I*(2.18886601712331E-01):b := -9.96441484966607E-01+I*(-2.46726904601806E-01):c := 8.31537843012029E-01+I*(7.25643712404212E-01):d := -4.20590805397917E-01+I*(-4.80161578715082E-02):e := -1.11710549641351E-01+I*(6.59983676756830E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.92346116607532E-02+I*(-7.39610653656681E-02):b := -8.58436589106714E-01+I*(-5.72069759856822E-01):c := 5.54217983621793E-01+I*(8.40353138206093E-01):d := -4.27524676897612E-01+I*(-1.25282476841182E-01):e := -1.37789155570488E-02+I*(9.39589009253130E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.27632441737625E-01+I*(-2.99446469047477E-01):b := -5.43592349252063E-01+I*(-7.32589009098569E-01):c := 2.68044848749660E-01+I*(7.49967886878937E-01):d := -3.83170498149461E-01+I*(-1.88928917815322E-01):e := -2.68269353363201E-01+I*(1.62064054356636E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.15720133247305E-01+I*(-3.52062482959255E-01):b := -1.99227884334609E-01+I*(-6.53175911634094E-01):c := 1.06922028662424E-01+I*(4.96780222038894E-01):d := -3.08282082331510E-01+I*(-2.09174603710728E-01):e := -1.52492215002055E+00+I*(9.89237845574178E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.95217734894404E-01+I*(-2.53479152624192E-02):b := 2.69986638443823E-01+I*(-2.64699943862371E-01):c := -2.35191655805008E-01+I*(8.07376247908820E-02):d := -3.07121348320710E-01+I*(-2.42703118626439E-01):e := -6.93478961769275E-01+I*(6.40321791593525E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.97060295966251E-01+I*(2.49226401951824E-01):b := 2.51578266156257E-01+I*(8.82227907078312E-02):c := -1.38291645921824E-02+I*(-1.21902954225437E-01):d := -2.74179002950713E-01+I*(-1.72468052579474E-01):e := -4.85987132310850E-01+I*(4.36945874983062E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.98583254904886E-01+I*(5.25025668272710E-01):b := 1.06222739000850E-02+I*(3.46744616754744E-01):c := 2.85999195127772E-01+I*(-1.34845577130351E-01):d := -2.94089932557226E-01+I*(-9.74899390842542E-02):e := -3.29579088621402E-01+I*(4.02555765240810E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.45865113673326E-01+I*(6.73000341821278E-01):b := -3.40135351620469E-01+I*(3.89900298720960E-01):c := 5.24000401620846E-01+I*(4.79657531745807E-02):d := -3.57537591892027E-01+I*(-5.28518707341039E-02):e := -2.15522178708239E-01+I*(4.16404531544412E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.57155499203101E-01+I*(6.23911428288844E-01):b := -6.36571219187554E-01+I*(1.97496813392505E-01):c := 5.88811045280153E-01+I*(3.40991583518057E-01):d := -4.34834116010175E-01+I*(-5.94404958069290E-02):e := -1.19231099194585E-01+I*(4.55843727035085E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.75448487547852E-02+I*(4.00728175879736E-01):b := -7.39979691848836E-01+I*(-1.40438110118883E-01):c := 4.50105505647433E-01+I*(6.07121871263014E-01):d := -4.89811602221612E-01+I*(-1.14172923406743E-01):e := -2.65673792882150E-02+I*(5.27695765798793E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.57540929607965E-02+I*(1.07880508801737E-01):b := -6.01974795988944E-01+I*(-4.65780965373900E-01):c := 1.72785646257198E-01+I*(7.21831297064895E-01):d := -4.96745473721308E-01+I*(-1.91439242376417E-01):e := 6.25937975680341E-02+I*(6.69219834252310E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.52621146359175E-01+I*(-1.17604894880072E-01):b := -2.87130556134294E-01+I*(-6.26300214615647E-01):c := -1.13387488614935E-01+I*(6.31446045737738E-01):d := -4.52391294973157E-01+I*(-2.55085683350557E-01):e := 5.26854882840330E-02+I*(9.79643833638808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.40708837868854E-01+I*(-1.70220908791850E-01):b := 5.72339087831608E-02+I*(-5.46887117151172E-01):c := -2.74510308702171E-01+I*(3.78258380897695E-01):d := -3.77502879155206E-01+I*(-2.75331369245963E-01):e := -5.05495475471351E-01+I*(1.17854788043868E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.12667464954921E-01+I*(2.36114010696161E-01):b := 3.86070234482037E-01+I*(-2.79184520011537E-01):c := -5.27082461330603E-02+I*(-1.60346013420864E-02):d := -4.94982215950395E-01+I*(-4.85294448851897E-01):e := -4.18803749535869E-01+I*(3.86972633192781E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.14510026026767E-01+I*(5.10688327910404E-01):b := 3.67661862194472E-01+I*(7.37382145586649E-02):c := 1.68654245079765E-01+I*(-2.18675180358406E-01):d := -4.62039870580399E-01+I*(-4.15059382804932E-01):e := -3.32980281600235E-01+I*(3.02046507870135E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.16032984965403E-01+I*(7.86487594231290E-01):b := 1.26705869938299E-01+I*(3.32260040605578E-01):c := 4.68482604799720E-01+I*(-2.31617803263320E-01):d := -4.81950800186912E-01+I*(-3.40081269309711E-01):e := -2.53270366527717E-01+I*(2.87196867449190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.63314843733842E-01+I*(9.34462267779859E-01):b := -2.24051755582255E-01+I*(3.75415722571793E-01):c := 7.06483811292793E-01+I*(-4.88064729583876E-02):d := -5.45398459521713E-01+I*(-2.95443200959561E-01):e := -1.90638265884969E-01+I*(3.02655462272947E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.74605229263617E-01+I*(8.85373354247424E-01):b := -5.20487623149339E-01+I*(1.83012237243339E-01):c := 7.71294454952101E-01+I*(2.44219357385089E-01):d := -6.22694983639861E-01+I*(-3.02031826032386E-01):e := -1.40128685283632E-01+I*(3.37989718760697E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.49945788153018E-02+I*(6.62190101838316E-01):b := -6.23896095810622E-01+I*(-1.54922686268049E-01):c := 6.32588915319381E-01+I*(5.10349645130046E-01):d := -6.77672469851298E-01+I*(-3.56764253632201E-01):e := -1.01767215459707E-01+I*(3.97364107788594E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.32038230213126E-02+I*(3.69342434760317E-01):b := -4.85891199950729E-01+I*(-4.80265541523066E-01):c := 3.55269055929146E-01+I*(6.25059070931927E-01):d := -6.84606341350993E-01+I*(-4.34030572601874E-01):e := -9.39312986907628E-02+I*(4.94244337816263E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70070876419691E-01+I*(1.43857031078508E-01):b := -1.71046960096079E-01+I*(-6.40784790764813E-01):c := 6.90959210570123E-02+I*(5.34673819604770E-01):d := -6.40252162602842E-01+I*(-4.97677013576014E-01):e := -1.87608948850330E-01+I*(6.14157711516027E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.58158567929371E-01+I*(9.12410171667296E-02):b := 1.73317504821375E-01+I*(-5.61371693300338E-01):c := -9.20268990302227E-02+I*(2.81486154764727E-01):d := -5.65363746784892E-01+I*(-5.17922699471420E-01):e := -3.92973990689329E-01+I*(5.71430579306334E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.57970247290750E-01+I*(4.47621936439192E-01):b := 4.84305934244625E-01+I*(-2.15663251860317E-01):c := 1.49286143727596E-01+I*(2.71316472909807E-02):d := -4.82957288391326E-01+I*(-7.91884827377275E-01):e := -2.53671309130872E-01+I*(3.46523537505981E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.59812808362597E-01+I*(7.22196253653435E-01):b := 4.65897561957059E-01+I*(1.37259482709884E-01):c := 3.70648634940421E-01+I*(-1.75508931725338E-01):d := -4.50014943021330E-01+I*(-7.21649761330310E-01):e := -2.23098950066913E-01+I*(2.80747377692584E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.61335767301233E-01+I*(9.97995519974321E-01):b := 2.24941569700887E-01+I*(3.95781308756797E-01):c := 6.70476994660376E-01+I*(-1.88451554630252E-01):d := -4.69925872627843E-01+I*(-6.46671647835090E-01):e := -1.76149368093720E-01+I*(2.56981772057789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.08617626069672E-01+I*(1.14597019352289E+00):b := -1.25816055819667E-01+I*(4.38936990723013E-01):c := 9.08478201153449E-01+I*(-5.64022432532051E-03):d := -5.33373531962644E-01+I*(-6.02033579484940E-01):e := -1.33487206216987E-01+I*(2.58466648494387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19908011599446E-01+I*(1.09688127999045E+00):b := -4.22251923386752E-01+I*(2.46533505394558E-01):c := 9.73288844812757E-01+I*(2.87385606018156E-01):d := -6.10670056080791E-01+I*(-6.08622204557765E-01):e := -9.76636368802596E-02+I*(2.76722794730878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.97026388488687E-02+I*(8.73698027581346E-01):b := -5.25660396048034E-01+I*(-9.14014181168300E-02):c := 8.34583305180037E-01+I*(5.53515893763113E-01):d := -6.65647542292228E-01+I*(-6.63354632157579E-01):e := -7.07493058213639E-02+I*(3.11766709861825E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.14933946428577E-02+I*(5.80850360503347E-01):b := -3.87655500188142E-01+I*(-4.16744273371846E-01):c := 5.57263445789802E-01+I*(6.68225319564995E-01):d := -6.72581413791924E-01+I*(-7.40620951127253E-01):e := -6.37909202510523E-02+I*(3.67497645740627E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15373658755521E-01+I*(3.55364956821539E-01):b := -7.28112603334910E-02+I*(-5.77263522613594E-01):c := 2.71090310917668E-01+I*(5.77840068237837E-01):d := -6.28227235043773E-01+I*(-8.04267392101393E-01):e := -1.07649204000139E-01+I*(4.32325313936638E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.03461350265200E-01+I*(3.02748942909760E-01):b := 2.71553204583963E-01+I*(-4.97850425149119E-01):c := 1.09967490830433E-01+I*(3.24652403397794E-01):d := -5.53338819225822E-01+I*(-8.24513077996799E-01):e := -2.08369592444832E-01+I*(4.32392504323359E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.03510629315025E-01+I*(5.10208952862752E-01):b := 5.18728162044480E-01+I*(-1.03858446736927E-01):c := 2.76276093843575E-01+I*(1.90038403215256E-01):d := -2.76673162890573E-01+I*(-1.01901720871804E+00):e := -1.41511387750842E-01+I*(3.48613906081310E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.05353190386872E-01+I*(7.84783270076995E-01):b := 5.00319789756914E-01+I*(2.49064287833275E-01):c := 4.97638585056401E-01+I*(-1.26021758010634E-02):d := -2.43730817520578E-01+I*(-9.48782142671072E-01):e := -1.43012387481569E-01+I*(2.91150641540256E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.06876149325507E-01+I*(1.06058253639788E+00):b := 2.59363797500742E-01+I*(5.07586113880188E-01):c := 7.97466944776356E-01+I*(-2.55447987059771E-02):d := -2.63641747127091E-01+I*(-8.73804029175852E-01):e := -1.15009391840723E-01+I*(2.58264028822766E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.54158008093946E-01+I*(1.20855720994645E+00):b := -9.13938280198125E-02+I*(5.50741795846403E-01):c := 1.03546815126943E+00+I*(1.57266531598955E-01):d := -3.27089406461891E-01+I*(-8.29165960825702E-01):e := -8.18575785492515E-02+I*(2.47831918357708E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.34551606376279E-01+I*(1.15946829641401E+00):b := -3.87829695586897E-01+I*(3.58338310517949E-01):c := 1.10027879492874E+00+I*(4.50292361942431E-01):d := -4.04385930580039E-01+I*(-8.35754585898527E-01):e := -5.05761037396531E-02+I*(2.53247619661725E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.24162256824594E-01+I*(9.36285044004907E-01):b := -4.91238168248179E-01+I*(2.04033870065608E-02):c := 9.61573255296017E-01+I*(7.16422649687388E-01):d := -4.59363416791476E-01+I*(-8.90487013498341E-01):e := -2.37802076847856E-02+I*(2.73090513469978E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.25953012618583E-01+I*(6.43437376926907E-01):b := -3.53233272388287E-01+I*(-3.04939468248456E-01):c := 6.84253395905781E-01+I*(8.31132075489269E-01):d := -4.66297288291171E-01+I*(-9.67753332468014E-01):e := -7.94897773770072E-03+I*(3.09843708329099E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.39085959220204E-01+I*(4.17951973245099E-01):b := -3.83890325336364E-02+I*(-4.65458717490204E-01):c := 3.98080261033648E-01+I*(7.40746824162113E-01):d := -4.21943109543020E-01+I*(-1.03139977344215E+00):e := -2.17566562765402E-02+I*(3.60766979026091E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.49001732289475E-01+I*(3.65335959333320E-01):b := 3.05975432383818E-01+I*(-3.86045620025729E-01):c := 2.36957440946413E-01+I*(4.87559159322070E-01):d := -3.47054693725070E-01+I*(-1.05164545933756E+00):e := -8.34630803467996E-02+I*(3.88463871729725E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.68353094282231E-01+I*(3.94589899405049E-01):b := 4.73230374933601E-01+I*(3.91518446940046E-03):c := 2.68841595219524E-01+I*(3.96459784826850E-01):d := 2.73475256373756E-02+I*(-1.06041382734960E+00):e := -4.65279153484913E-02+I*(3.68890907798047E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70195655354077E-01+I*(6.69164216619292E-01):b := 4.54822002646035E-01+I*(3.56837919039602E-01):c := 4.90204086432350E-01+I*(1.93819205810531E-01):d := 6.02898710073719E-02+I*(-9.90178761302636E-01):e := -7.46711384884251E-02+I*(3.18910314086116E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71718614292713E-01+I*(9.44963482940178E-01):b := 2.13866010389863E-01+I*(6.15359745086515E-01):c := 7.90032446152304E-01+I*(1.80876582905617E-01):d := 4.03789414008588E-02+I*(-9.15200647807416E-01):e := -6.24936163682691E-02+I*(2.76853289753033E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.09995269388484E-02+I*(1.09293815648875E+00):b := -1.36891615130692E-01+I*(6.58515427052731E-01):c := 1.02803365264538E+00+I*(3.63687913210549E-01):d := -2.30687179339422E-02+I*(-8.70562579457266E-01):e := -3.57479987950380E-02+I*(2.55153056682573E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.69709141409072E-01+I*(1.04384924295631E+00):b := -4.33327482697776E-01+I*(4.66111941724276E-01):c := 1.09284429630469E+00+I*(6.56713743554025E-01):d := -1.00365242052091E-01+I*(-8.77151204530091E-01):e := -5.94004049995182E-03+I*(2.49676032778182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.59319791857388E-01+I*(8.20665990547204E-01):b := -5.36735955359058E-01+I*(1.28177018212888E-01):c := 9.54138756671965E-01+I*(9.22844031298982E-01):d := -1.55342728263527E-01+I*(-9.31883632129905E-01):e := 2.33201316327106E-02+I*(2.58317986335839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.61110547651377E-01+I*(5.27818323469205E-01):b := -3.98731059499166E-01+I*(-1.97165837042129E-01):c := 6.76818897281730E-01+I*(1.03755345710086E+00):d := -1.62276599763223E-01+I*(-1.00914995109958E+00):e := 4.79310859801117E-02+I*(2.83353987409669E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.74243494252999E-01+I*(3.02332919787396E-01):b := -8.38868196445156E-02+I*(-3.57685086283876E-01):c := 3.90645762409597E-01+I*(9.47168205773706E-01):d := -1.17922421015071E-01+I*(-1.07279639207372E+00):e := 5.48526277613593E-02+I*(3.27805572037066E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.61558027433193E-02+I*(2.49716905875618E-01):b := 2.60477645272939E-01+I*(-2.78271988819401E-01):c := 2.29522942322362E-01+I*(6.93980540933663E-01):d := -4.30340051971213E-02+I*(-1.09304207796913E+00):e := 1.88618480220602E-02+I*(3.74097361630930E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.25304663190985E-02+I*(1.54864216141592E-01):b := 3.69101493152747E-01+I*(5.72291619467327E-02):c := 1.30461332386885E-01+I*(5.49808933551582E-01):d := 2.86850118216706E-01+I*(-8.96704745342091E-01):e := 5.18945063249469E-02+I*(4.10154945211091E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64373027390945E-01+I*(4.29438533355835E-01):b := 3.50693120865182E-01+I*(4.10151896516934E-01):c := 3.51823823599710E-01+I*(3.47168354535263E-01):d := 3.19792463586702E-01+I*(-8.26469679295125E-01):e := -7.63705686097362E-03+I*(3.69662971131864E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.58959863295804E-02+I*(7.05237799676721E-01):b := 1.09737128609009E-01+I*(6.68673722563847E-01):c := 6.51652183319665E-01+I*(3.34225731630349E-01):d := 2.99881533980189E-01+I*(-7.51491565799905E-01):e := -1.34872064448958E-02+I*(3.15058313260514E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.86822154901981E-01+I*(8.53212473225289E-01):b := -2.41020496911545E-01+I*(7.11829404530063E-01):c := 8.89653389812739E-01+I*(5.17037061935281E-01):d := 2.36433874645388E-01+I*(-7.06853497449755E-01):e := 7.94678972478470E-03+I*(2.79488397247471E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.75531769372205E-01+I*(8.04123559692854E-01):b := -5.37456364478630E-01+I*(5.19425919201608E-01):c := 9.54464033472045E-01+I*(8.10062892278758E-01):d := 1.59137350527240E-01+I*(-7.13442122522580E-01):e := 3.82646885237436E-02+I*(2.62208484662689E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.65142419820520E-01+I*(5.80940307283747E-01):b := -6.40864837139912E-01+I*(1.81490995690221E-01):c := 8.15758493839327E-01+I*(1.07619318002371E+00):d := 1.04159864315803E-01+I*(-7.68174550122395E-01):e := 7.18878591971995E-02+I*(2.60152178340961E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.66933175614509E-01+I*(2.88092640205747E-01):b := -5.02859941280019E-01+I*(-1.43851859564796E-01):c := 5.38438634449090E-01+I*(1.19090260582560E+00):d := 9.72259928161071E-02+I*(-8.45440869092068E-01):e := 1.06228827769273E-01+I*(2.75225294261989E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.80066122216131E-01+I*(6.26072365239390E-02):b := -1.88015701425369E-01+I*(-3.04371108806544E-01):c := 2.52265499576958E-01+I*(1.10051735449844E+00):d := 1.41580171564258E-01+I*(-9.09087310066208E-01):e := 1.32552889114981E-01+I*(3.14702695170367E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.91978430706452E-01+I*(9.99122261216030E-03):b := 1.56348763492085E-01+I*(-2.24958011342069E-01):c := 9.11426794897222E-02+I*(8.47329689658396E-01):d := 2.16468587382209E-01+I*(-9.29332995961614E-01):e := 1.22012053610941E-01+I*(3.77659155283873E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.35558329137084E-01+I*(-9.67977854744495E-02):b := 2.55064577750795E-01+I*(3.11372831145667E-02):c := -7.41150317496383E-02+I*(5.78332078415202E-01):d := 3.80410467729484E-01+I*(-6.04491261590601E-01):e := 1.74387167121354E-01+I*(5.00264251635523E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.37400890208930E-01+I*(1.77776531739794E-01):b := 2.36656205463230E-01+I*(3.84060017684768E-01):c := 1.47247459463187E-01+I*(3.75691499398882E-01):d := 4.13352813099480E-01+I*(-5.34256195543636E-01):e := 5.92001606096548E-02+I*(4.71800815574279E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.38923849147566E-01+I*(4.53575798060680E-01):b := -4.29978679294246E-03+I*(6.42581843731681E-01):c := 4.47075819183142E-01+I*(3.62748876493969E-01):d := 3.93441883492967E-01+I*(-4.59278082048416E-01):e := 2.78385131703017E-02+I*(3.90034361665409E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13794292083995E-01+I*(6.01550471609248E-01):b := -3.55057412313497E-01+I*(6.85737525697897E-01):c := 6.85077025676215E-01+I*(5.45560206798900E-01):d := 3.29994224158166E-01+I*(-4.14640013698265E-01):e := 4.69901545778689E-02+I*(3.31432876937131E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.02503906554219E-01+I*(5.52461558076813E-01):b := -6.51493279880581E-01+I*(4.93334040369442E-01):c := 7.49887669335523E-01+I*(8.38586037142377E-01):d := 2.52697700040018E-01+I*(-4.21228638771091E-01):e := 8.24762642799046E-02+I*(2.98004710319843E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.92114557002535E-01+I*(3.29278305667706E-01):b := -7.54901752541864E-01+I*(1.55399116858054E-01):c := 6.11182129702803E-01+I*(1.10471632488733E+00):d := 1.97720213828581E-01+I*(-4.75961066370905E-01):e := 1.25107848476266E-01+I*(2.83285742438569E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.93905312796524E-01+I*(3.64306385897065E-02):b := -6.16896856681971E-01+I*(-1.69943738396962E-01):c := 3.33862270312568E-01+I*(1.21942575068921E+00):d := 1.90786342328885E-01+I*(-5.53227385340579E-01):e := 1.73949963210567E-01+I*(2.87792957455107E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.07038259398145E-01+I*(-1.89054765092102E-01):b := -3.02052616827321E-01+I*(-3.30462987638710E-01):c := 4.76891354404345E-02+I*(1.12904049936206E+00):d := 2.35140521077037E-01+I*(-6.16873826314719E-01):e := 2.25565804683947E-01+I*(3.22813443925781E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.18950567888466E-01+I*(-2.41670779003881E-01):b := 4.23118480901335E-02+I*(-2.51049890174235E-01):c := -1.13433684646801E-01+I*(8.75852834522015E-01):d := 3.10028936894987E-01+I*(-6.37119512210125E-01):e := 2.50378942724378E-01+I*(4.08081339445112E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.53266134109363E-01+I*(-2.42640657975328E-01):b := 1.84478768823460E-01+I*(-6.21517719425947E-02):c := -2.49163942797535E-01+I*(4.68682922936576E-01):d := 2.64250646831220E-01+I*(-3.20503312733579E-01):e := 3.24802096226326E-01+I*(7.67279182738389E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.55108695181209E-01+I*(3.19336592389156E-02):b := 1.66070396535894E-01+I*(2.90770962627607E-01):c := -2.78014515847097E-02+I*(2.66042343920257E-01):d := 2.97192992201217E-01+I*(-2.50268246686614E-01):e := 5.42308852126983E-02+I*(7.05264163080896E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56631654119845E-01+I*(3.07732925559801E-01):b := -7.48855957202778E-02+I*(5.49292788674520E-01):c := 2.72026908135245E-01+I*(2.53099721015343E-01):d := 2.77282062594704E-01+I*(-1.75290133191393E-01):e := 8.15110239456603E-03+I*(5.33558656052543E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03913512888284E-01+I*(4.55707599108370E-01):b := -4.25643221240833E-01+I*(5.92448470640736E-01):c := 5.10028114628319E-01+I*(4.35911051320275E-01):d := 2.13834403259902E-01+I*(-1.30652064841243E-01):e := 5.04368037945701E-02+I*(4.32593467240446E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.84796101581941E-01+I*(4.06618685575935E-01):b := -7.22079088807917E-01+I*(4.00044985312281E-01):c := 5.74838758287626E-01+I*(7.28936881663751E-01):d := 1.36537879141755E-01+I*(-1.37240689914068E-01):e := 1.09858346752544E-01+I*(3.77936939623865E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.74406752030256E-01+I*(1.83435433166828E-01):b := -8.25487561469199E-01+I*(6.21100618008932E-02):c := 4.36133218654906E-01+I*(9.95067169408708E-01):d := 8.15603929303174E-02+I*(-1.91973117513882E-01):e := 1.76853446862252E-01+I*(3.49804921201100E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76197507824245E-01+I*(-1.09412233911172E-01):b := -6.87482665609306E-01+I*(-2.63232793454124E-01):c := 1.58813359264670E-01+I*(1.10977659521059E+00):d := 7.46265214306219E-02+I*(-2.69239436483556E-01):e := 2.56134317495828E-01+I*(3.45479514855396E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.89330454425867E-01+I*(-3.34897637592981E-01):b := -3.72638425754656E-01+I*(-4.23752042695871E-01):c := -1.27359775607463E-01+I*(1.01939134388343E+00):d := 1.18980700178773E-01+I*(-3.32885877457696E-01):e := 3.54993609658041E-01+I*(3.83201782946265E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.87572370838129E-02+I*(-3.87513651504759E-01):b := -2.82739608372020E-02+I*(-3.44338945231396E-01):c := -2.88482595694698E-01+I*(7.66203679043389E-01):d := 1.93869115996723E-01+I*(-3.53131563353102E-01):e := 4.47397481701295E-01+I*(5.25704480943919E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.13785979736665E-01+I*(-2.14422900454901E-01):b := 1.90371950841726E-01+I*(-1.78987017571146E-01):c := -3.12778069825552E-01+I*(2.72167525578777E-01):d := -7.27687330717880E-03+I*(-1.77622016215711E-01):e := -1.78129428194704E-01+I*(1.43738877600379E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.15628540808511E-01+I*(6.01514167593424E-02):b := 1.71963578554160E-01+I*(1.73935716999056E-01):c := -9.14155786127260E-02+I*(6.95269465624574E-02):d := 2.56654720628175E-02+I*(-1.07386950168746E-01):e := -3.77689391548995E-01+I*(8.40980700736846E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.17151499747147E-01+I*(3.35950683080228E-01):b := -6.89924137020124E-02+I*(4.32457543045968E-01):c := 2.08412781107229E-01+I*(5.65843236575436E-02):d := 5.75454245630443E-03+I*(-3.24088366735259E-02):e := -2.19496338259970E-01+I*(6.08754538034817E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64433358515586E-01+I*(4.83925356628797E-01):b := -4.19750039222567E-01+I*(4.75613225012184E-01):c := 4.46413987600302E-01+I*(2.39395653962476E-01):d := -5.76931168784968E-02+I*(1.22292316766243E-02):e := -8.09472267447406E-02+I*(5.24988240532610E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.57237440453614E-02+I*(4.34836443096362E-01):b := -7.16185906789651E-01+I*(2.83209739683729E-01):c := 5.11224631259609E-01+I*(5.32421484305952E-01):d := -1.34989640996645E-01+I*(5.64060660379918E-03):e := 3.81149506313400E-02+I*(4.92164095164333E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13886906402954E-01+I*(2.11653190687254E-01):b := -8.19594379450933E-01+I*(-5.47251838276585E-02):c := 3.72519091626890E-01+I*(7.98551772050908E-01):d := -1.89967127208082E-01+I*(-4.90918209960150E-02):e := 1.57227613212241E-01+I*(4.87922936738978E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.15677662196943E-01+I*(-8.11944763907451E-02):b := -6.81589483591041E-01+I*(-3.80068039082675E-01):c := 9.51992322366542E-02+I*(9.13261197852790E-01):d := -1.96900998707777E-01+I*(-1.26358139965689E-01):e := 2.98392541075407E-01+I*(5.19228271611827E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.11893912014357E-02+I*(-3.06679880072554E-01):b := -3.66745243736391E-01+I*(-5.40587288324423E-01):c := -1.90973902635479E-01+I*(8.22875946525633E-01):d := -1.52546819959626E-01+I*(-1.90004580939829E-01):e := 4.89451243296541E-01+I*(6.43895800252740E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.59277082711115E-01+I*(-3.59295893984332E-01):b := -2.23807788189365E-02+I*(-4.61174190859948E-01):c := -3.52096722722714E-01+I*(5.69688281685590E-01):d := -7.76584041416756E-02+I*(-2.10250266835235E-01):e := 6.27040235136317E-01+I*(1.10947074547685E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.56629396661163E-01+I*(-6.71699231205488E-02):b := 2.82043053753664E-01+I*(-3.94296435965156E-03):c := -6.33684816978188E-01+I*(-1.58463127262333E-01):d := -1.29761938263098E-01+I*(-9.52850815448742E-02):e := 5.05358150199688E-01+I*(2.01055480514732E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.58471957733009E-01+I*(2.07404394093695E-01):b := 2.63634681466098E-01+I*(3.48979770210550E-01):c := -4.12322325765363E-01+I*(-3.61103706278652E-01):d := -9.68195928931014E-02+I*(-2.50500154979090E-02):e := -3.69462917858298E-01+I*(1.17935122932600E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.59994916671644E-01+I*(4.83203660414580E-01):b := 2.26786892099254E-02+I*(6.07501596257463E-01):c := -1.12493966045408E-01+I*(-3.74046329183566E-01):d := -1.16730522499615E-01+I*(4.99280979973113E-02):e := -1.97093791747957E-01+I*(7.57560716663606E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07276775440083E-01+I*(6.31178333963149E-01):b := -3.28078936310629E-01+I*(6.50657278223678E-01):c := 1.25507240447665E-01+I*(-1.91234998878634E-01):d := -1.80178181834416E-01+I*(9.45661663474615E-02):e := -3.11680007911337E-02+I*(6.06965538074589E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.18567160969859E-01+I*(5.82089420430714E-01):b := -6.24514803877714E-01+I*(4.58253792895224E-01):c := 1.90317884106973E-01+I*(1.01790831464842E-01):d := -2.57474705952564E-01+I*(8.79775412746366E-02):e := 1.06271339274438E-01+I*(5.33664120663693E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.89565105215436E-02+I*(3.58906168021606E-01):b := -7.27923276538996E-01+I*(1.20318869383836E-01):c := 5.16123444742536E-02+I*(3.67921119209799E-01):d := -3.12452192164001E-01+I*(3.32451136748224E-02):e := 2.40572785626816E-01+I*(4.92482929610638E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.71657547275544E-02+I*(6.60585009436068E-02):b := -5.89918380679103E-01+I*(-2.05023985871181E-01):c := -2.25707514915982E-01+I*(4.82630545011681E-01):d := -3.19386063663696E-01+I*(-4.40212052948515E-02):e := 4.00329773193393E-01+I*(4.76138303396015E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.14032808125933E-01+I*(-1.59426902738202E-01):b := -2.75074140824453E-01+I*(-3.65543235112928E-01):c := -5.11880649788115E-01+I*(3.92245293684524E-01):d := -2.75031884915545E-01+I*(-1.07667646268992E-01):e := 6.37186342119606E-01+I*(5.14020118744942E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02120499635612E-01+I*(-2.12042916649980E-01):b := 6.92903240930013E-02+I*(-2.86130137648453E-01):c := -6.73003469875351E-01+I*(1.39057628844481E-01):d := -2.00143469097595E-01+I*(-1.27913332164398E-01):e := 1.04476203078072E+00+I*(8.26751795041598E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.74079126721679E-01+I*(1.94292002838031E-01):b := 3.98126649791878E-01+I*(-1.84275405088176E-02):c := -4.51201407306240E-01+I*(-2.55235353395301E-01):d := -3.17622805892783E-01+I*(-3.37876411770332E-01):e := -3.78483351140726E-01+I*(9.06673408661906E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.75921687793525E-01+I*(4.68866320052274E-01):b := 3.79718277504312E-01+I*(3.34495194061384E-01):c := -2.29838916093415E-01+I*(-4.57875932411621E-01):d := -2.84680460522787E-01+I*(-2.67641345723366E-01):e := -3.55964503988851E-01+I*(5.88997624539704E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.77444646732160E-01+I*(7.44665586373160E-01):b := 1.38762285248139E-01+I*(5.93017020108297E-01):c := 6.99894436265398E-02+I*(-4.70818555316535E-01):d := -3.04591390129300E-01+I*(-1.92663232228146E-01):e := -2.30437020375889E-01+I*(4.73380515334554E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.24726505500600E-01+I*(8.92640259921728E-01):b := -2.11995340272415E-01+I*(6.36172702074512E-01):c := 3.07990650119613E-01+I*(-2.88007225011603E-01):d := -3.68039049464101E-01+I*(-1.48025163877996E-01):e := -1.23129211132611E-01+I*(4.38302182231630E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.36016891030375E-01+I*(8.43551346389294E-01):b := -5.08431207839500E-01+I*(4.43769216746058E-01):c := 3.72801293778921E-01+I*(5.01860533187318E-03):d := -4.45335573582250E-01+I*(-1.54613788950821E-01):e := -2.90317068389554E-02+I*(4.37866406596604E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.64062405820602E-02+I*(6.20368093980187E-01):b := -6.11839680500782E-01+I*(1.05834293234670E-01):c := 2.34095754146202E-01+I*(2.71148893076830E-01):d := -5.00313059793687E-01+I*(-2.09346216550635E-01):e := 6.41228718945238E-02+I*(4.64913465783174E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.46154847880707E-02+I*(3.27520426902187E-01):b := -4.73834784640889E-01+I*(-2.19508562020347E-01):c := -4.32241052440340E-02+I*(3.85858318878712E-01):d := -5.07246931293382E-01+I*(-2.86612535520309E-01):e := 1.65472638756113E-01+I*(5.36560639796049E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31482538186449E-01+I*(1.02035023220378E-01):b := -1.58990544786239E-01+I*(-3.80027811262095E-01):c := -3.29397240116167E-01+I*(2.95473067551555E-01):d := -4.62892752545231E-01+I*(-3.50258976494449E-01):e := 2.55214034597743E-01+I*(7.16615564977337E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.19570229696129E-01+I*(4.94190093086001E-02):b := 1.85373920131216E-01+I*(-3.00614713797619E-01):c := -4.90520060203403E-01+I*(4.22854027115123E-02):d := -3.88004336727280E-01+I*(-3.70504662389856E-01):e := 8.92054101068604E-02+I*(1.05949266466300E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.19381909057508E-01+I*(4.05799928581062E-01):b := 4.96362349554466E-01+I*(4.50937276424016E-02):c := -2.49207017445584E-01+I*(-2.12069104762234E-01):d := -3.05597878333714E-01+I*(-6.44466790295710E-01):e := -1.66467425699399E-01+I*(5.65216540046244E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.21224470129354E-01+I*(6.80374245795305E-01):b := 4.77953977266899E-01+I*(3.98016462212603E-01):c := -2.78445262327589E-02+I*(-4.14709683778553E-01):d := -2.72655532963717E-01+I*(-5.74231724248745E-01):e := -1.89049576337129E-01+I*(4.35427295852763E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.22747429067990E-01+I*(9.56173512116191E-01):b := 2.36997985010727E-01+I*(6.56538288259516E-01):c := 2.71983833487196E-01+I*(-4.27652306683467E-01):d := -2.92566462570230E-01+I*(-4.99253610753524E-01):e := -1.39466301520311E-01+I*(3.63803295871240E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.70029287836429E-01+I*(1.10414818566476E+00):b := -1.13759640509828E-01+I*(6.99693970225732E-01):c := 5.09985039980269E-01+I*(-2.44840976378535E-01):d := -3.56014121905032E-01+I*(-4.54615542403374E-01):e := -8.18711159438264E-02+I*(3.36807998705249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.13196733662051E-02+I*(1.05505927213232E+00):b := -4.10195508076912E-01+I*(5.07290484897277E-01):c := 5.74795683639577E-01+I*(4.81848539649404E-02):d := -4.33310646023180E-01+I*(-4.61204167476199E-01):e := -2.69605693064395E-02+I*(3.35378321986796E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.08290977082111E-01+I*(8.31876019723217E-01):b := -5.13603980738194E-01+I*(1.69355561385889E-01):c := 4.36090144006857E-01+I*(3.14315141709898E-01):d := -4.88288132234617E-01+I*(-5.15936595076013E-01):e := 2.58577879678469E-02+I*(3.55319696761017E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10081732876099E-01+I*(5.39028352645218E-01):b := -3.75599084878302E-01+I*(-1.55987293869128E-01):c := 1.58770284616622E-01+I*(4.29024567511779E-01):d := -4.95222003734313E-01+I*(-5.93202914045687E-01):e := 7.40633484950839E-02+I*(4.04749192764867E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.67853205222793E-02+I*(3.13542948963409E-01):b := -6.07548450236508E-02+I*(-3.16506543110876E-01):c := -1.27402850255511E-01+I*(3.38639316184622E-01):d := -4.50867824986161E-01+I*(-6.56849355019827E-01):e := 9.21191519039290E-02+I*(5.02000536785878E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64873012031958E-01+I*(2.60926935051631E-01):b := 2.83609619893803E-01+I*(-2.37093445646400E-01):c := -2.88525670342747E-01+I*(8.54516513445795E-02):d := -3.75979409168211E-01+I*(-6.77095040915234E-01):e := -3.21031233046416E-03+I*(6.15004306789723E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.64922291081783E-01+I*(4.68386945004622E-01):b := 5.30784577354320E-01+I*(1.56898532765792E-01):c := -1.22217067329604E-01+I*(-4.91623488379585E-02):d := -9.93137528329615E-02+I*(-8.71599171636472E-01):e := -2.11526264979195E-02+I*(4.51126219049719E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.66764852153629E-01+I*(7.42961262218865E-01):b := 5.12376205066754E-01+I*(5.09821267335994E-01):c := 9.91454238832211E-02+I*(-2.51802927854278E-01):d := -6.63714074629650E-02+I*(-8.01364105589507E-01):e := -7.07648570814175E-02+I*(3.84407745683704E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.68287811092265E-01+I*(1.01876052853975E+00):b := 2.71420212810582E-01+I*(7.68343093382907E-01):c := 3.98973783603176E-01+I*(-2.64745550759192E-01):d := -8.62823370694785E-02+I*(-7.26385992094286E-01):e := -5.91634082269648E-02+I*(3.24754601961809E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.15569669860704E-01+I*(1.16673520208832E+00):b := -7.93374127099730E-02+I*(8.11498775349122E-01):c := 6.36974990096249E-01+I*(-8.19342204542601E-02):d := -1.49729996404279E-01+I*(-6.81747923744136E-01):e := -2.64275338764867E-02+I*(2.92844193078687E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.73139944609520E-01+I*(1.11764628855588E+00):b := -3.75773280277057E-01+I*(6.19095290020668E-01):c := 7.01785633755557E-01+I*(2.11091609889216E-01):d := -2.27026520522428E-01+I*(-6.88336548816961E-01):e := 1.09259154632684E-02+I*(2.81555452960525E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.62750595057836E-01+I*(8.94463036146777E-01):b := -4.79181752938340E-01+I*(2.81160366509279E-01):c := 5.63080094122837E-01+I*(4.77221897634173E-01):d := -2.82004006733865E-01+I*(-7.43068976416775E-01):e := 4.91824223187643E-02+I*(2.87142162586393E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.64541350851825E-01+I*(6.01615369068777E-01):b := -3.41176857078447E-01+I*(-4.41824887457380E-02):c := 2.85760234732602E-01+I*(5.91931323436055E-01):d := -2.88937878233561E-01+I*(-8.20335295386449E-01):e := 8.55262052818113E-02+I*(3.12817229940411E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.77674297453446E-01+I*(3.76129965386969E-01):b := -2.63326172237962E-02+I*(-2.04701737987485E-01):c := -4.12900139531564E-04+I*(5.01546072108897E-01):d := -2.44583699485409E-01+I*(-8.83981736360589E-01):e := 1.06688773182529E-01+I*(3.67266091690720E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.10413394056233E-01+I*(3.23513951475191E-01):b := 3.18031847693658E-01+I*(-1.25288640523010E-01):c := -1.61535720226767E-01+I*(2.48358407268855E-01):d := -1.69695283667458E-01+I*(-9.04227422255996E-01):e := 7.31950266545058E-02+I*(4.40372771957943E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.29764756048989E-01+I*(3.52767891546920E-01):b := 4.85286790243441E-01+I*(2.64672163972119E-01):c := -1.29651565953655E-01+I*(1.57259032773636E-01):d := 2.04706935694987E-01+I*(-9.12995790268037E-01):e := 9.08549149789480E-02+I*(3.92629621248667E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.31607317120835E-01+I*(6.27342208761163E-01):b := 4.66878417955875E-01+I*(6.17594898542321E-01):c := 9.17109252591701E-02+I*(-4.53815462426837E-02):d := 2.37649281064984E-01+I*(-8.42760724221071E-01):e := 2.68421626857766E-02+I*(3.65431363303634E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.33130276059471E-01+I*(9.03141475082049E-01):b := 2.25922425699703E-01+I*(8.76116724589234E-01):c := 3.91539284979125E-01+I*(-5.83241691475976E-02):d := 2.17738351458471E-01+I*(-7.67782610725851E-01):e := 1.18211632411139E-02+I*(3.13426987341653E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.19587865172090E-01+I*(1.05111614863062E+00):b := -1.24835199820852E-01+I*(9.19272406555449E-01):c := 6.29540491472198E-01+I*(1.24487161157334E-01):d := 1.54290692123669E-01+I*(-7.23144542375700E-01):e := 2.74185109150353E-02+I*(2.75601273573426E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.08297479642314E-01+I*(1.00202723509818E+00):b := -4.21271067387936E-01+I*(7.26868921226994E-01):c := 6.94351135131505E-01+I*(4.17512991500810E-01):d := 7.69941680055213E-02+I*(-7.29733167448525E-01):e := 5.44018451572885E-02+I*(2.54912418904193E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.97908130090630E-01+I*(7.78843982689075E-01):b := -5.24679540049219E-01+I*(3.88933997715607E-01):c := 5.55645595498787E-01+I*(6.83643279245767E-01):d := 2.20166817940841E-02+I*(-7.84465595048340E-01):e := 8.61432184188217E-02+I*(2.48803256106397E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.99698885884619E-01+I*(4.85996315611075E-01):b := -3.86674644189326E-01+I*(6.35911424605894E-02):c := 2.78325736108551E-01+I*(7.98352705047648E-01):d := 1.50828102943881E-02+I*(-8.61731914018013E-01):e := 1.20100706800284E-01+I*(2.58700827109629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.12831832486241E-01+I*(2.60510911929267E-01):b := -7.18304043346752E-02+I*(-9.69281067811577E-02):c := -7.84739876358243E-03+I*(7.07967453720492E-01):d := 5.94369890425403E-02+I*(-9.25378354992154E-01):e := 1.49427980925803E-01+I*(2.91510294348037E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.24744140976561E-01+I*(2.07894898017489E-01):b := 2.72534060582779E-01+I*(-1.75150093166825E-02):c := -1.68970218850817E-01+I*(4.54779788880449E-01):d := 1.34325404860490E-01+I*(-9.45624040887560E-01):e := 1.49420107290125E-01+I*(3.50264057362715E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.39421280858566E-02+I*(1.13042208283462E-01):b := 3.81157908462588E-01+I*(3.17986141449451E-01):c := -2.68031828786295E-01+I*(3.10608181498368E-01):d := 4.64209528274317E-01+I*(-7.49286708260526E-01):e := 1.98072120309632E-01+I*(3.54801895442089E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.25784689157703E-01+I*(3.87616525497705E-01):b := 3.62749536175022E-01+I*(6.70908876019653E-01):c := -4.66693375734694E-02+I*(1.07967602482048E-01):d := 4.97151873644313E-01+I*(-6.79051642213561E-01):e := 1.24949484315613E-01+I*(3.64854026004705E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.73076480963384E-02+I*(6.63415791818591E-01):b := 1.21793543918850E-01+I*(9.29430702066566E-01):c := 2.53159022146485E-01+I*(9.50249795771345E-02):d := 4.77240944037800E-01+I*(-6.04073528718340E-01):e := 8.36566708268230E-02+I*(3.20977655779113E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.25410493135223E-01+I*(8.11390465367160E-01):b := -2.28964081601705E-01+I*(9.72586384032782E-01):c := 4.91160228639559E-01+I*(2.77836309882067E-01):d := 4.13793284702999E-01+I*(-5.59435460368190E-01):e := 8.28215432782997E-02+I*(2.75970548918551E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.14120107605447E-01+I*(7.62301551834725E-01):b := -5.25399949168789E-01+I*(7.80182898704327E-01):c := 5.55970872298867E-01+I*(5.70862140225542E-01):d := 3.36496760584851E-01+I*(-5.66024085441015E-01):e := 1.01402296232644E-01+I*(2.45135025650748E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.03730758053762E-01+I*(5.39118299425618E-01):b := -6.28808421830071E-01+I*(4.42247975192939E-01):c := 4.17265332666147E-01+I*(8.36992427970499E-01):d := 2.81519274373414E-01+I*(-6.20756513040830E-01):e := 1.29229513252081E-01+I*(2.27895925796187E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.05521513847752E-01+I*(2.46270632347618E-01):b := -4.90803525970179E-01+I*(1.16905119937922E-01):c := 1.39945473275912E-01+I*(9.51701853772381E-01):d := 2.74585402873718E-01+I*(-6.98022832010504E-01):e := 1.63363735644634E-01+I*(2.24716246709958E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.18654460449373E-01+I*(2.07852286658094E-02):b := -1.75959286115528E-01+I*(-4.36141293038254E-02):c := -1.46227661596222E-01+I*(8.61316602445224E-01):d := 3.18939581621870E-01+I*(-7.61669272984643E-01):e := 2.00777716632442E-01+I*(2.41788895575624E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.30566768939694E-01+I*(-3.18307852459691E-02):b := 1.68405178801926E-01+I*(3.57989681606496E-02):c := -3.07350481683457E-01+I*(6.08128937605182E-01):d := 3.93827997439820E-01+I*(-7.81914958880050E-01):e := 2.25775116531406E-01+I*(2.90126103919972E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.69699909038425E-02+I*(-1.38619793332579E-01):b := 2.67120993060636E-01+I*(2.91894262617285E-01):c := -4.72608192922818E-01+I*(3.39131326361987E-01):d := 5.57769877787095E-01+I*(-4.57073224509036E-01):e := 3.26470954860457E-01+I*(3.29522498556468E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.98812551975689E-01+I*(1.35954523881664E-01):b := 2.48712620773070E-01+I*(6.44816997187487E-01):c := -2.51245701709993E-01+I*(1.36490747345668E-01):d := 5.90712223157092E-01+I*(-3.86838158462071E-01):e := 2.45785020845771E-01+I*(3.89712834847725E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00335510914324E-01+I*(4.11753790202550E-01):b := 7.75662851689818E-03+I*(9.03338823234400E-01):c := 4.85826580099620E-02+I*(1.23548124440754E-01):d := 5.70801293550578E-01+I*(-3.11860044966851E-01):e := 1.67083160654628E-01+I*(3.56471111743450E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52382630317237E-01+I*(5.59728463751119E-01):b := -3.43000997003657E-01+I*(9.46494505200616E-01):c := 2.86583864503036E-01+I*(3.06359454745686E-01):d := 5.07353634215777E-01+I*(-2.67221976616701E-01):e := 1.45224725389516E-01+I*(2.98865260563820E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.41092244787461E-01+I*(5.10639550218684E-01):b := -6.39436864570741E-01+I*(7.54091019872161E-01):c := 3.51394508162343E-01+I*(5.99385285089162E-01):d := 4.30057110097629E-01+I*(-2.73810601689526E-01):e := 1.55536637763281E-01+I*(2.53478557309804E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.30702895235776E-01+I*(2.87456297809576E-01):b := -7.42845337232023E-01+I*(4.16156096360773E-01):c := 2.12688968529624E-01+I*(8.65515572834119E-01):d := 3.75079623886192E-01+I*(-3.28543029289340E-01):e := 1.81135732586938E-01+I*(2.22498778098769E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.32493651029766E-01+I*(-5.39136926842378E-03):b := -6.04840441372131E-01+I*(9.08132411057557E-02):c := -6.46308908606121E-02+I*(9.80224998636001E-01):d := 3.68145752386497E-01+I*(-4.05809348259013E-01):e := 2.17570985938541E-01+I*(2.05044548329381E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.45626597631387E-01+I*(-2.30876772950232E-01):b := -2.89996201517480E-01+I*(-6.97060081359916E-02):c := -3.50804025732745E-01+I*(8.89839747308844E-01):d := 4.12499931134649E-01+I*(-4.69455789233153E-01):e := 2.64821381971170E-01+I*(2.06253070157091E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.57538906121708E-01+I*(-2.83492786862010E-01):b := 5.43682633999739E-02+I*(9.70708932848363E-03):c := -5.11926845819981E-01+I*(6.36652082468801E-01):d := 4.87388346952599E-01+I*(-4.89701475128560E-01):e := 3.15984038198327E-01+I*(2.43058943463936E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.14677795876121E-01+I*(-2.84462665833457E-01):b := 1.96535184133301E-01+I*(1.98605207560124E-01):c := -6.47657103970716E-01+I*(2.29482170883362E-01):d := 4.41610056888832E-01+I*(-1.73085275652014E-01):e := 5.26583789205744E-01+I*(3.29869120622394E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.16520356947967E-01+I*(-9.88834861921397E-03):b := 1.78126811845735E-01+I*(5.51527942130326E-01):c := -4.26294612757890E-01+I*(2.68415918670423E-02):d := 4.74552402258828E-01+I*(-1.02850209605048E-01):e := 4.27155717317911E-01+I*(4.92788771341295E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.18043315886603E-01+I*(2.65910917701672E-01):b := -6.28291804104373E-02+I*(8.10049768177239E-01):c := -1.26466253037935E-01+I*(1.38989689621284E-02):d := 4.54641472652315E-01+I*(-2.78720961098281E-02):e := 2.65033262805649E-01+I*(4.65194285194010E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.53251746550419E-02+I*(4.13885591250240E-01):b := -4.13586805930992E-01+I*(8.53205450143454E-01):c := 1.11534953455138E-01+I*(1.96710299267060E-01):d := 3.91193813317514E-01+I*(1.67659722403221E-02):e := 2.12416036202905E-01+I*(3.71081812117977E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.23384439815183E-01+I*(3.64796677717806E-01):b := -7.10022673498076E-01+I*(6.60801964815000E-01):c := 1.76345597114446E-01+I*(4.89736129610536E-01):d := 3.13897289199366E-01+I*(1.01773471674970E-02):e := 2.17861246053281E-01+I*(2.97088469709861E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.12995090263498E-01+I*(1.41613425308698E-01):b := -8.13431146159358E-01+I*(3.22867041303612E-01):c := 3.76400574817267E-02+I*(7.55866417355493E-01):d := 2.58919802987929E-01+I*(-4.45550804323171E-02):e := 2.46793326373012E-01+I*(2.44240297609378E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.14785846057487E-01+I*(-1.51234241769302E-01):b := -6.75426250299466E-01+I*(-2.47581395140545E-03):c := -2.39679801908509E-01+I*(8.70575843157375E-01):d := 2.51985931488233E-01+I*(-1.21821399401991E-01):e := 2.91790751928375E-01+I*(2.06865404064854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.27918792659109E-01+I*(-3.76719645451110E-01):b := -3.60582010444816E-01+I*(-1.62995063193153E-01):c := -5.25852936780642E-01+I*(7.80190591830218E-01):d := 2.96340110236385E-01+I*(-1.85467840376131E-01):e := 3.56815584452331E-01+I*(1.87339364585807E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.01688988505709E-02+I*(-4.29335659362888E-01):b := -1.62175455273614E-02+I*(-8.35819657286776E-02):c := -6.86975756867878E-01+I*(5.27002926990175E-01):d := 3.71228526054335E-01+I*(-2.05713526271537E-01):e := 4.48282957591207E-01+I*(2.08231480649631E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.75197641503423E-01+I*(-2.56244908313030E-01):b := 2.02428366151566E-01+I*(8.17699619315727E-02):c := -7.11271230998732E-01+I*(3.29667735255623E-02):d := 1.70082536750433E-01+I*(-3.02039791341464E-02):e := 9.58222520779978E-01+I*(5.13088020483783E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.77040202575269E-01+I*(1.83294089012130E-02):b := 1.84019993864000E-01+I*(4.34692696501775E-01):c := -4.89908739785906E-01+I*(-1.69673805490757E-01):d := 2.03024882120429E-01+I*(4.00310869128189E-02):e := 6.02527849578567E-01+I*(9.85516374247590E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.78563161513905E-01+I*(2.94128675222099E-01):b := -5.69359983921719E-02+I*(6.93214522548687E-01):c := -1.90080380065952E-01+I*(-1.82616428395671E-01):d := 1.83113952513916E-01+I*(1.15009200408039E-01):e := 2.34582530080731E-01+I*(7.58873537562522E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.25845020282344E-01+I*(4.42103348770667E-01):b := -4.07693623912727E-01+I*(7.36370204514903E-01):c := 4.79208264271216E-02+I*(1.94901909260630E-04):d := 1.19666293179115E-01+I*(1.59647268758189E-01):e := 2.05631566922731E-01+I*(5.43434032430772E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.71354058121194E-02+I*(3.93014435238232E-01):b := -7.04129491479811E-01+I*(5.43966719186448E-01):c := 1.12731470086429E-01+I*(2.93220732252737E-01):d := 4.23697690609670E-02+I*(1.53058643685364E-01):e := 2.48421559939614E-01+I*(4.17543838779149E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.52475244636196E-01+I*(1.69831182829125E-01):b := -8.07537964141093E-01+I*(2.06031795675060E-01):c := -2.59740695462899E-02+I*(5.59351019997694E-01):d := -1.26077171504703E-02+I*(9.83262160855501E-02):e := 3.10563986022220E-01+I*(3.33746049803795E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.54266000430185E-01+I*(-1.23016484248875E-01):b := -6.69533068281201E-01+I*(-1.19311059579957E-01):c := -3.03293928936526E-01+I*(6.74060445799575E-01):d := -1.95415886501659E-02+I*(2.10598971158762E-02):e := 3.91081348571516E-01+I*(2.70882042839521E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.26010529681936E-02+I*(-3.48501887930683E-01):b := -3.54688828426550E-01+I*(-2.79830308821704E-01):c := -5.89467063808659E-01+I*(5.83675194472419E-01):d := 2.48125900979858E-02+I*(-4.25865438582640E-02):e := 5.07273742979699E-01+I*(2.26276040923808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.20688744477873E-01+I*(-4.01117901842461E-01):b := -1.03243635090958E-02+I*(-2.00417211357229E-01):c := -7.50589883895894E-01+I*(3.30487529632376E-01):d := 9.97010059159361E-02+I*(-6.28322297536701E-02):e := 7.00390757366688E-01+I*(2.36129804711946E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.53951683051810E-01+I*(-1.24011545535068E-01):b := 1.23667448142067E-01+I*(2.03558185171296E-01):c := -7.85193009068310E-01+I*(-5.97848000709519E-01):d := -8.86552354339449E-02+I*(1.31648117823313E-01):e := 1.27716510085705E+00+I*(-5.96775808990435E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.55794244123656E-01+I*(1.50562771679175E-01):b := 1.05259075854501E-01+I*(5.56480919741498E-01):c := -5.63830517855484E-01+I*(-8.00488579725838E-01):d := -5.57128900639485E-02+I*(2.01883183870278E-01):e := 3.53055876057982E+00+I*(5.02284646991919E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.57317203062292E-01+I*(4.26362038000061E-01):b := -1.35696916401671E-01+I*(8.15002745788410E-01):c := -2.64002158135530E-01+I*(-8.13431202630752E-01):d := -7.56238196704616E-02+I*(2.76861297365498E-01):e := 7.80540725872330E-01+I*(1.79661575025604E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.04599061830731E-01+I*(5.74336711548629E-01):b := -4.86454541922226E-01+I*(8.58158427754626E-01):c := -2.60009516424563E-02+I*(-6.30619872325820E-01):d := -1.39071479005263E-01+I*(3.21499365715649E-01):e := 4.59060736150478E-01+I*(9.11552783168587E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.15889447360507E-01+I*(5.25247798016194E-01):b := -7.82890409489310E-01+I*(6.65754942426172E-01):c := 3.88096920168513E-02+I*(-3.37594041982344E-01):d := -2.16368003123411E-01+I*(3.14910740642824E-01):e := 4.77545747940033E-01+I*(5.58716836997712E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.62787969121916E-02+I*(3.02064545607087E-01):b := -8.86298882150592E-01+I*(3.27820018914784E-01):c := -9.98958476158683E-02+I*(-7.14637542373874E-02):d := -2.71345489334848E-01+I*(2.60178313043010E-01):e := 5.26770514767090E-01+I*(3.46137805984664E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.44880411182026E-02+I*(9.21687852908711E-03):b := -7.48293986290700E-01+I*(2.47716365976654E-03):c := -3.77215707006104E-01+I*(4.32456715644940E-02):d := -2.78279360834544E-01+I*(1.82911994073336E-01):e := 5.89400835742600E-01+I*(1.74714165203648E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.11355094516581E-01+I*(-2.16268525152721E-01):b := -4.33449746436050E-01+I*(-1.58042085581981E-01):c := -6.63388841878237E-01+I*(-4.71395797626629E-02):d := -2.33925182086392E-01+I*(1.19265553099196E-01):e := 6.77604469819560E-01+I*(-5.40132264336333E-04):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.99442786026261E-01+I*(-2.68884539064500E-01):b := -8.90852815185954E-02+I*(-7.86289881175058E-02):c := -8.24511661965472E-01+I*(-3.00327244602706E-01):d := -1.59036766268442E-01+I*(9.90198672037895E-02):e := 8.36296668098476E-01+I*(-2.27048968498708E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.71401413112327E-01+I*(1.37450380423512E-01):b := 2.39751044180281E-01+I*(1.89073609022130E-01):c := -6.02709599396362E-01+I*(-6.94620226842488E-01):d := -2.76516103063631E-01+I*(-1.10943212402145E-01):e := 2.83098251404988E+00+I*(3.64312642433017E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.73243974184173E-01+I*(4.12024697637755E-01):b := 2.21342671892715E-01+I*(5.41996343592332E-01):c := -3.81347108183536E-01+I*(-8.97260805858807E-01):d := -2.43573757693634E-01+I*(-4.07081463551794E-02):e := -8.16565815933704E-01+I*(1.71421370572931E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.74766933122808E-01+I*(6.87823963958641E-01):b := -1.96133203634569E-02+I*(8.00518169639244E-01):c := -8.15187484635818E-02+I*(-9.10203428763721E-01):d := -2.63484687300147E-01+I*(3.42699671400410E-02):e := -3.13538423552369E-01+I*(9.62020193686029E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.22048791891248E-01+I*(8.35798637507209E-01):b := -3.70370945884011E-01+I*(8.43673851605460E-01):c := 1.56482458029491E-01+I*(-7.27392098458789E-01):d := -3.26932346634949E-01+I*(7.89080354901913E-02):e := -3.79419395754876E-02+I*(7.40704730852782E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.33339177421023E-01+I*(7.86709723974774E-01):b := -6.66806813451096E-01+I*(6.51270366277005E-01):c := 2.21293101688799E-01+I*(-4.34366268115313E-01):d := -4.04228870753096E-01+I*(7.23194104173662E-02):e := 1.55498550034833E-01+I*(6.25489648116556E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.37285269727080E-02+I*(5.63526471565667E-01):b := -7.70215286112378E-01+I*(3.13335442765617E-01):c := 8.25875620560796E-02+I*(-1.68235980370356E-01):d := -4.59206356964534E-01+I*(1.75869828175519E-02):e := 3.30588164516669E-01+I*(5.43821024962625E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.19377711787188E-02+I*(2.70678804487667E-01):b := -6.32210390252485E-01+I*(-1.20074124893997E-02):c := -1.94732297334156E-01+I*(-5.35265545684745E-02):d := -4.66140228464229E-01+I*(-5.96793361521220E-02):e := 5.31815967326524E-01+I*(4.72968981941470E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.28804824577097E-01+I*(4.51934008058589E-02):b := -3.17366150397835E-01+I*(-1.72526661731147E-01):c := -4.80905432206289E-01+I*(-1.43911805895631E-01):d := -4.21786049716078E-01+I*(-1.23325777126262E-01):e := 8.36807555880043E-01+I*(4.07323854529945E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.16892516086777E-01+I*(-7.42261310591958E-03):b := 2.69983145196192E-02+I*(-9.31135642666720E-02):c := -6.42028252293524E-01+I*(-3.97099470735674E-01):d := -3.46897633898127E-01+I*(-1.43571463021668E-01):e := 1.53533232176297E+00+I*(4.29822851786449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.16704195448156E-01+I*(3.48958306166542E-01):b := 3.37986743942869E-01+I*(2.52594877173349E-01):c := -4.00715209535706E-01+I*(-6.51453978209421E-01):d := -2.64491175504561E-01+I*(-4.17533590927523E-01):e := 6.14902300938349E-02+I*(1.15966401250437E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.18546756520003E-01+I*(6.23532623380786E-01):b := 3.19578371655303E-01+I*(6.05517611743551E-01):c := -1.79352718322881E-01+I*(-8.54094557225740E-01):d := -2.31548830134565E-01+I*(-3.47298524880557E-01):e := -2.15885871491877E-01+I*(8.00734966959827E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.20069715458638E-01+I*(8.99331889701671E-01):b := 7.86223793991308E-02+I*(8.64039437790463E-01):c := 1.20475641397074E-01+I*(-8.67037180130653E-01):d := -2.51459759741078E-01+I*(-2.72320411385337E-01):e := -1.40252491230432E-01+I*(5.80186974237046E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.67351574227078E-01+I*(1.04730656325024E+00):b := -2.72135246121423E-01+I*(9.07195119756679E-01):c := 3.58476847890147E-01+I*(-6.84225849825722E-01):d := -3.14907419075879E-01+I*(-2.27682343035187E-01):e := -3.75274988181114E-02+I*(4.88447492066253E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.86419597568531E-02+I*(9.98217649717805E-01):b := -5.68571113688508E-01+I*(7.14791634428225E-01):c := 4.23287491549455E-01+I*(-3.91200019482246E-01):d := -3.92203943194027E-01+I*(-2.34270968108012E-01):e := 5.85804349579973E-02+I*(4.48036294035978E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.10968690691462E-01+I*(7.75034397308697E-01):b := -6.71979586349790E-01+I*(3.76856710916836E-01):c := 2.84581951916735E-01+I*(-1.25069731737289E-01):d := -4.47181429405464E-01+I*(-2.89003395707826E-01):e := 1.56469114283513E-01+I*(4.36129064693304E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.12759446485451E-01+I*(4.82186730230698E-01):b := -5.33974690489898E-01+I*(5.15138556618196E-02):c := 7.26209252649967E-03+I*(-1.03603059354072E-02):d := -4.54115300905160E-01+I*(-3.66269714677500E-01):e := 2.70450619682620E-01+I*(4.55890365865687E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.41076069129274E-02+I*(2.56701326548889E-01):b := -2.19130450635247E-01+I*(-1.09005393579928E-01):c := -2.78911042345634E-01+I*(-1.00745557262564E-01):d := -4.09761122157008E-01+I*(-4.29916155651640E-01):e := 4.15376085088165E-01+I*(5.47878483244661E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.62195298422607E-01+I*(2.04085312637111E-01):b := 1.25234014282207E-01+I*(-2.95922961154527E-02):c := -4.40033862432869E-01+I*(-3.53933222102607E-01):d := -3.34872706339058E-01+I*(-4.50161841547046E-01):e := 5.15166573431089E-01+I*(8.55480036014627E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.62244577472431E-01+I*(4.11545322590102E-01):b := 3.72408971742723E-01+I*(3.64399682296739E-01):c := -2.73725259419727E-01+I*(-4.88547222285145E-01):d := -5.82070500038086E-02+I*(-6.44665972268284E-01):e := 1.86297469162535E-01+I*(6.38291895648769E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.64087138544277E-01+I*(6.86119639804345E-01):b := 3.54000599455158E-01+I*(7.17322416866941E-01):c := -5.23627682069012E-02+I*(-6.91187801301465E-01):d := -2.52647046338124E-02+I*(-5.74430906221319E-01):e := 2.02287078049473E-02+I*(5.71359195173255E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.65610097482913E-01+I*(9.61918906125231E-01):b := 1.13044607198985E-01+I*(9.75844242913854E-01):c := 2.47465591513054E-01+I*(-7.04130424206378E-01):d := -4.51756342403253E-02+I*(-4.99452792726099E-01):e := -3.65229248951873E-03+I*(4.52005445199162E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.12891956251353E-01+I*(1.10989357967380E+00):b := -2.37713018321569E-01+I*(1.01899992488007E+00):c := 4.85466798006127E-01+I*(-5.21319093901447E-01):d := -1.08623293575127E-01+I*(-4.54814724375949E-01):e := 3.17618786649120E-02+I*(3.79152092996085E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.75817658218872E-01+I*(1.06080466614136E+00):b := -5.34148885888653E-01+I*(8.26596439551615E-01):c := 5.50277441665434E-01+I*(-2.28293263557970E-01):d := -1.85919817693274E-01+I*(-4.61403349448774E-01):e := 8.12347556912924E-02+I*(3.40562757033363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.65428308667188E-01+I*(8.37621413732257E-01):b := -6.37557358549935E-01+I*(4.88661516040227E-01):c := 4.11571902032715E-01+I*(3.78370241869864E-02):d := -2.40897303904712E-01+I*(-5.16135777048588E-01):e := 1.37053945994952E-01+I*(3.24489707770535E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.67219064461177E-01+I*(5.44773746654257E-01):b := -4.99552462690043E-01+I*(1.63318660785210E-01):c := 1.34252042642479E-01+I*(1.52546449988868E-01):d := -2.47831175404407E-01+I*(-5.93402096018262E-01):e := 2.00982216086167E-01+I*(3.31335421929209E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.80352011062798E-01+I*(3.19288342972449E-01):b := -1.84708222835392E-01+I*(2.79941154346258E-03):c := -1.51921092229654E-01+I*(6.21611986617110E-02):d := -2.03476996656256E-01+I*(-6.57048536992402E-01):e := 2.72055584474883E-01+I*(3.77956631252621E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.07735680446881E-01+I*(2.66672329060671E-01):b := 1.59656242082061E-01+I*(8.22125090079378E-02):c := -3.13043912316889E-01+I*(-1.91026466178332E-01):d := -1.28588580838305E-01+I*(-6.77294222887808E-01):e := 3.10426340079146E-01+I*(5.01502329262153E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.27087042439637E-01+I*(2.95926269132400E-01):b := 3.26911184631844E-01+I*(4.72173313503067E-01):c := -2.81159758043778E-01+I*(-2.82125840673551E-01):d := 2.45813638524140E-01+I*(-6.86062590899849E-01):e := 2.78321667257944E-01+I*(4.23292100459797E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.28929603511483E-01+I*(5.70500586346643E-01):b := 3.08502812344279E-01+I*(8.25096048073269E-01):c := -5.97972668309520E-02+I*(-4.84766419689871E-01):d := 2.78755983894136E-01+I*(-6.15827524852884E-01):e := 1.66953897938514E-01+I*(4.49895833842703E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.30452562450119E-01+I*(8.46299852667529E-01):b := 6.75468200881067E-02+I*(1.08361787412018E+00):c := 2.40031092889003E-01+I*(-4.97709042594785E-01):d := 2.58845054287623E-01+I*(-5.40849411357664E-01):e := 1.03032192699267E-01+I*(3.86088679585726E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.22265578781442E-01+I*(9.94274526216098E-01):b := -2.83210805432448E-01+I*(1.12677355608640E+00):c := 4.78032299382076E-01+I*(-3.14897712289853E-01):d := 1.95397394952822E-01+I*(-4.96211343007514E-01):e := 1.00766304246087E-01+I*(3.22531300993067E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.10975193251667E-01+I*(9.45185612683663E-01):b := -5.79646672999532E-01+I*(9.34370070757942E-01):c := 5.42842943041383E-01+I*(-2.18718819463767E-02):d := 1.18100870834674E-01+I*(-5.02799968080339E-01):e := 1.24355032719773E-01+I*(2.79876954189245E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.00585843699982E-01+I*(7.22002360274556E-01):b := -6.83055145660814E-01+I*(5.96435147246555E-01):c := 4.04137403408664E-01+I*(2.44258405798580E-01):d := 6.31233846232370E-02+I*(-5.57532395680153E-01):e := 1.59508218546187E-01+I*(2.54542654244847E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.02376599493972E-01+I*(4.29154693196556E-01):b := -5.45050249800923E-01+I*(2.71092291991538E-01):c := 1.26817544018428E-01+I*(3.58967831600462E-01):d := 5.61895131235417E-02+I*(-6.34798714649827E-01):e := 2.03742545350098E-01+I*(2.45536236966219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.15509546095593E-01+I*(2.03669289514747E-01):b := -2.30206009946272E-01+I*(1.10573042749790E-01):c := -1.59355590853705E-01+I*(2.68582580273305E-01):d := 1.00543691871693E-01+I*(-6.98445155623967E-01):e := 2.56576697187050E-01+I*(2.60708428524299E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.27421854585913E-01+I*(1.51053275602969E-01):b := 1.14158454971182E-01+I*(1.89986140214265E-01):c := -3.20478410940940E-01+I*(1.53949154332623E-02):d := 1.75432107689643E-01+I*(-7.18690841519373E-01):e := 3.03026310513663E-01+I*(3.20915749733380E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.12644144765048E-02+I*(5.62005858689424E-02):b := 2.22782302850991E-01+I*(5.25487290980399E-01):c := -4.19540020876417E-01+I*(-1.28776691948819E-01):d := 5.05316231103470E-01+I*(-5.22353508892338E-01):e := 3.53361623046128E-01+I*(2.82882722536909E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.23106975548351E-01+I*(3.30774903083186E-01):b := 2.04373930563425E-01+I*(8.78410025550601E-01):c := -1.98177529663591E-01+I*(-3.31417270965138E-01):d := 5.38258576473466E-01+I*(-4.52118442845373E-01):e := 2.90282081887466E-01+I*(3.58285688440457E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.46299344869867E-02+I*(6.06574169404072E-01):b := -3.65820616927465E-02+I*(1.13693185159751E+00):c := 1.01650830056363E-01+I*(-3.44359893870052E-01):d := 5.18347646866953E-01+I*(-3.77140329350153E-01):e := 2.04966833804007E-01+I*(3.42700625533495E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.28088206744574E-01+I*(7.54548842952640E-01):b := -3.87339687213301E-01+I*(1.18008753356373E+00):c := 3.39652036549437E-01+I*(-1.61548563565120E-01):d := 4.54899987532152E-01+I*(-3.32502261000003E-01):e := 1.72015986409056E-01+I*(2.88753148611601E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.16797821214799E-01+I*(7.05459929420205E-01):b := -6.83775554780386E-01+I*(9.87684048235274E-01):c := 4.04462680208744E-01+I*(1.31477266778356E-01):d := 3.77603463414004E-01+I*(-3.39090886072828E-01):e := 1.74948350656593E-01+I*(2.41620324647212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.06408471663115E-01+I*(4.82276677011098E-01):b := -7.87184027441668E-01+I*(6.49749124723887E-01):c := 2.65757140576025E-01+I*(3.97607554523313E-01):d := 3.22625977202567E-01+I*(-3.93823313672642E-01):e := 1.95577921800548E-01+I*(2.07300241249921E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.08199227457104E-01+I*(1.89429009933098E-01):b := -6.49179131581775E-01+I*(3.24406269468870E-01):c := -1.15627188142111E-02+I*(5.12316980325194E-01):d := 3.15692105702872E-01+I*(-4.71089632642316E-01):e := 2.28281210530475E-01+I*(1.85217581283955E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.21332174058725E-01+I*(-3.60563937487106E-02):b := -3.34334891727125E-01+I*(1.63887020227122E-01):c := -2.97735853686344E-01+I*(4.21931728998037E-01):d := 3.60046284451023E-01+I*(-5.34736073616456E-01):e := 2.73151506281495E-01+I*(1.79389074130013E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.33244482549045E-01+I*(-8.86724076604889E-02):b := 1.00295731903291E-02+I*(2.43300117691598E-01):c := -4.58858673773579E-01+I*(1.68744064157995E-01):d := 4.34934700268973E-01+I*(-5.54981759511862E-01):e := 3.26661299516699E-01+I*(2.05105458204953E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.42922772944906E-02+I*(-1.95461415747099E-01):b := 1.08745387449039E-01+I*(4.99395412148233E-01):c := -6.24116385012940E-01+I*(-1.00253547085200E-01):d := 5.98876580616248E-01+I*(-2.30140025140849E-01):e := 4.29614639089946E-01+I*(1.60571908779332E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.96134838366337E-01+I*(7.91129014671445E-02):b := 9.03370151614731E-02+I*(8.52318146718435E-01):c := -4.02753893800114E-01+I*(-3.02894126101519E-01):d := 6.31818925986244E-01+I*(-1.59904959093883E-01):e := 4.23684865072465E-01+I*(2.68799633972127E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.76577973049725E-02+I*(3.54912167788030E-01):b := -1.50618977094699E-01+I*(1.11083997276535E+00):c := -1.02925534080160E-01+I*(-3.15836749006433E-01):d := 6.11907996379731E-01+I*(-8.49268455986630E-02):e := 3.26061480070275E-01+I*(3.11570836879182E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.55060343926588E-01+I*(5.02886841336599E-01):b := -5.01376602615253E-01+I*(1.15399565473156E+00):c := 1.35075672412913E-01+I*(-1.33025418701501E-01):d := 5.48460337044930E-01+I*(-4.02887772485129E-02):e := 2.57550911233903E-01+I*(2.71313431475397E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.43769958396813E-01+I*(4.53797927804164E-01):b := -7.97812470182337E-01+I*(9.61592169403109E-01):c := 1.99886316072221E-01+I*(1.60000411641975E-01):d := 4.71163812926782E-01+I*(-4.68774023213380E-02):e := 2.37478687095303E-01+I*(2.18158294068903E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.33380608845128E-01+I*(2.30614675395056E-01):b := -9.01220942843620E-01+I*(6.23657245891721E-01):c := 6.11807764395014E-02+I*(4.26130699386932E-01):d := 4.16186326715345E-01+I*(-1.01609829921152E-01):e := 2.43954096906996E-01+I*(1.73181881683140E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.35171364639117E-01+I*(-6.22329916829435E-02):b := -7.63216046983727E-01+I*(2.98314390636703E-01):c := -2.16139082950734E-01+I*(5.40840125188813E-01):d := 4.09252455215649E-01+I*(-1.78876148890826E-01):e := 2.66941117182903E-01+I*(1.37647463490485E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.48304311240739E-01+I*(-2.87718395364751E-01):b := -4.48371807129077E-01+I*(1.37795141394956E-01):c := -5.02312217822867E-01+I*(4.50454873861656E-01):d := 4.53606633963801E-01+I*(-2.42522589864966E-01):e := 3.05992506110566E-01+I*(1.13061894546017E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.60216619731059E-01+I*(-3.40334409276530E-01):b := -1.04007342211623E-01+I*(2.17208238859431E-01):c := -6.63435037910102E-01+I*(1.97267209021614E-01):d := 5.28495049781751E-01+I*(-2.62768275760372E-01):e := 3.64438122034497E-01+I*(1.10387921369012E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.12000082266769E-01+I*(-3.41304288247977E-01):b := 3.81595785217039E-02+I*(4.06106357091072E-01):c := -7.99165296060837E-01+I*(-2.09902702563825E-01):d := 4.82716759717985E-01+I*(5.38479237161738E-02):e := 5.28302650745394E-01+I*(2.41193907272558E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.13842643338615E-01+I*(-6.67299710337336E-02):b := 1.97512062341379E-02+I*(7.59029091661273E-01):c := -5.77802804848011E-01+I*(-4.12543281580144E-01):d := 5.15659105087981E-01+I*(1.24082989763139E-01):e := 6.13809229911857E-01+I*(1.56744636347779E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.15365602277251E-01+I*(2.09069295287152E-01):b := -2.21204786022034E-01+I*(1.01755091770819E+00):c := -2.77974445128057E-01+I*(-4.25485904485058E-01):d := 4.95748175481468E-01+I*(1.99061103258359E-01):e := 5.11860470865918E-01+I*(3.01804423322119E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.26474610456900E-02+I*(3.57043968835721E-01):b := -5.71962411542588E-01+I*(1.06070659967440E+00):c := -3.99732386349837E-02+I*(-2.42674574180126E-01):d := 4.32300516146667E-01+I*(2.43699171608510E-01):e := 3.80157823378714E-01+I*(2.84309983911418E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.26062153424534E-01+I*(3.07955055303286E-01):b := -8.68398279109673E-01+I*(8.68303114345947E-01):c := 2.48374050243239E-02+I*(5.03512561633495E-02):d := 3.55003992028519E-01+I*(2.37110546535685E-01):e := 3.24902404815273E-01+I*(2.16696294291536E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.15672803872850E-01+I*(8.47718028941784E-02):b := -9.71806751770955E-01+I*(5.30368190834560E-01):c := -1.13868134608395E-01+I*(3.16481543908306E-01):d := 3.00026505817082E-01+I*(1.82378118935870E-01):e := 3.13757731092049E-01+I*(1.53426242230843E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.17463559666839E-01+I*(-2.08075864183822E-01):b := -8.33801855911063E-01+I*(2.05025335579542E-01):c := -3.91187993998631E-01+I*(4.31190969710188E-01):d := 2.93092634317386E-01+I*(1.05111799966197E-01):e := 3.26515154993798E-01+I*(9.87790600453365E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.30596506268460E-01+I*(-4.33561267865630E-01):b := -5.18957616056412E-01+I*(4.45060863377949E-02):c := -6.77361128870764E-01+I*(3.40805718383031E-01):d := 3.37446813065538E-01+I*(4.14653589920564E-02):e := 3.60153706845352E-01+I*(5.09867369567424E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.74911852412189E-02+I*(-4.86177281777408E-01):b := -1.74593151138958E-01+I*(1.23919183802270E-01):c := -8.38483948957999E-01+I*(8.76180535429882E-02):d := 4.12335228883488E-01+I*(2.12196730966501E-02):e := 4.23205974046466E-01+I*(1.50964375659847E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.72519927894071E-01+I*(-3.13086530727550E-01):b := 4.40527605399694E-02+I*(2.89271111462520E-01):c := -8.62779423088853E-01+I*(-4.06418099921624E-01):d := 2.11189239579586E-01+I*(1.96729220234041E-01):e := 7.04453163564250E-01+I*(-1.76005014998903E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.74362488965917E-01+I*(-3.85122135133067E-02):b := 2.56443882524035E-02+I*(6.42193846032722E-01):c := -6.41416931876028E-01+I*(-6.09058678937944E-01):d := 2.44131584949582E-01+I*(2.66964286281006E-01):e := 1.02297163327887E+00+I*(-3.09028505558295E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.75885447904553E-01+I*(2.37287052807579E-01):b := -2.15311604003769E-01+I*(9.00715672079635E-01):c := -3.41588572156073E-01+I*(-6.22001301842857E-01):d := 2.24220655343069E-01+I*(3.41942399776227E-01):e := 9.02876188940730E-01+I*(4.37594662272916E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23167306672992E-01+I*(3.85261726356147E-01):b := -5.66069229524323E-01+I*(9.43871354045850E-01):c := -1.03587365663000E-01+I*(-4.39189971537926E-01):d := 1.60772996008268E-01+I*(3.86580468126377E-01):e := 5.68630867169980E-01+I*(4.21927560327647E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.44576922027676E-02+I*(3.36172812823713E-01):b := -8.62505097091407E-01+I*(7.51467868717396E-01):c := -3.87767220036923E-02+I*(-1.46164141194450E-01):d := 8.34764718901199E-02+I*(3.79991843053552E-01):e := 4.52017878750544E-01+I*(2.86753222238048E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.55152958245548E-01+I*(1.12989560414605E-01):b := -9.65913569752690E-01+I*(4.13532945206008E-01):c := -1.77482261636412E-01+I*(1.19966146550507E-01):d := 2.84989856786826E-02+I*(3.25259415453738E-01):e := 4.22501588940752E-01+I*(1.75268257083179E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.56943714039537E-01+I*(-1.79858106663394E-01):b := -8.27908673892797E-01+I*(8.81900899509908E-02):c := -4.54802121026647E-01+I*(2.34675572352389E-01):d := 2.15651141789871E-02+I*(2.47993096484064E-01):e := 4.28326817943655E-01+I*(8.15135423438713E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.99233393588419E-02+I*(-4.05343510345203E-01):b := -5.13064434038147E-01+I*(-7.23291592907567E-02):c := -7.40975255898781E-01+I*(1.44290321025232E-01):d := 6.59192929271386E-02+I*(1.84346655509924E-01):e := 4.60869722085762E-01+I*(-7.37406506291516E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.18011030868521E-01+I*(-4.57959524256981E-01):b := -1.68699969120693E-01+I*(7.08393817371852E-03):c := -9.02098075986016E-01+I*(-1.08897343814811E-01):d := 1.40807708745089E-01+I*(1.64100969614517E-01):e := 5.34885255657050E-01+I*(-9.94169719826224E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.88437526023636E-01+I*(-1.69275955653959E-01):b := -1.31034472376507E-01+I*(2.60711410746542E-01):c := -6.18823865170411E-01+I*(-1.03182393004581E+00):d := -2.03035522937125E-01+I*(3.31911913412170E-01):e := 3.04949095163617E-01+I*(-6.78444882297544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.90280087095482E-01+I*(1.05298361560285E-01):b := -1.49442844664073E-01+I*(6.13634145316744E-01):c := -3.97461373957585E-01+I*(-1.23446450906213E+00):d := -1.70093177567129E-01+I*(4.02146979459135E-01):e := 2.16191336586595E-01+I*(-1.03977067032165E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.91803046034118E-01+I*(3.81097627881171E-01):b := -3.90398836920245E-01+I*(8.72155971363657E-01):c := -9.76330142376301E-02+I*(-1.24740713196704E+00):d := -1.90004107173642E-01+I*(4.77125092954356E-01):e := 5.04109904151586E-01+I*(-2.06157572340729E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.39084904802557E-01+I*(5.29072301429739E-01):b := -7.41156462440799E-01+I*(9.15311653329872E-01):c := 1.40368192255443E-01+I*(-1.06459580166211E+00):d := -2.53451766508443E-01+I*(5.21763161304506E-01):e := 2.80428555364842E+00+I*(-4.08217902442628E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.50375290332333E-01+I*(4.79983387897304E-01):b := -1.03759233000788E+00+I*(7.22908168001418E-01):c := 2.05178835914751E-01+I*(-7.71569971318636E-01):d := -3.30748290626591E-01+I*(5.15174536231681E-01):e := 1.23869918026348E+00+I*(1.69317996633583E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.07646398840174E-02+I*(2.56800135488196E-01):b := -1.14100080266917E+00+I*(3.84973244490030E-01):c := 6.64732962820311E-02+I*(-5.05439683573679E-01):d := -3.85725776838028E-01+I*(4.60442108631866E-01):e := 8.08536282447643E-01+I*(-3.58265717481118E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89738840900285E-02+I*(-3.60475315898033E-02):b := -1.00299590680927E+00+I*(5.96303892350129E-02):c := -2.10846563108205E-01+I*(-3.90730257771797E-01):d := -3.92659648337724E-01+I*(3.83175789662193E-01):e := 6.19384927002228E-01+I*(-1.95598701846389E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.45840937488407E-01+I*(-2.61532935271612E-01):b := -6.88151666954623E-01+I*(-1.00888860006735E-01):c := -4.97019697980338E-01+I*(-4.81115509098954E-01):d := -3.48305469589572E-01+I*(3.19529348688053E-01):e := 4.98704777252408E-01+I*(-3.33998862034746E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.33928628998086E-01+I*(-3.14148949183390E-01):b := -3.43787202037169E-01+I*(-2.14757625422595E-02):c := -6.58142518067573E-01+I*(-7.34303173938997E-01):d := -2.73417053771622E-01+I*(2.99283662792647E-01):e := 4.00301877048146E-01+I*(-4.81021744168254E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.05887256084152E-01+I*(9.21859703046212E-02):b := -1.49508763382923E-02+I*(2.46226834597376E-01):c := -4.36340455498463E-01+I*(-1.12859615617878E+00):d := -3.90896390566811E-01+I*(8.93205831867127E-02):e := 7.26106049630768E-02+I*(-1.32089845179187E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.07729817155998E-01+I*(3.66760287518864E-01):b := -3.33592486258582E-02+I*(5.99149569167578E-01):c := -2.14977964285638E-01+I*(-1.33123673519510E+00):d := -3.57954045196814E-01+I*(1.59555649233678E-01):e := -1.04592736521821E+00+I*(-1.48162246284959E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.09252776094634E-01+I*(6.42559553839750E-01):b := -2.74315240882030E-01+I*(8.57671395214490E-01):c := 8.48503954343172E-02+I*(-1.34417935810001E+00):d := -3.77864974803327E-01+I*(2.34533762728898E-01):e := -2.51111689533989E+00+I*(8.67563928223106E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.56534634863074E-01+I*(7.90534227388318E-01):b := -6.25072866402585E-01+I*(9.00827077180706E-01):c := 3.22851601927390E-01+I*(-1.16136802779508E+00):d := -4.41312634138129E-01+I*(2.79171831079049E-01):e := -7.91835226146772E-01+I*(2.07539754227459E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67825020392849E-01+I*(7.41445313855884E-01):b := -9.21508733969669E-01+I*(7.08423591852251E-01):c := 3.87662245586698E-01+I*(-8.68342197451604E-01):d := -5.18609158256277E-01+I*(2.72583206006223E-01):e := 6.79662388632863E-01+I*(1.39328454092025E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.82143699445338E-02+I*(5.18262061446776E-01):b := -1.02491720663095E+00+I*(3.70488668340863E-01):c := 2.48956705953979E-01+I*(-6.02211909706647E-01):d := -5.73586644467714E-01+I*(2.17850778406409E-01):e := 1.03696129404734E+00+I*(5.96308690258133E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.64236141505446E-02+I*(2.25414394368777E-01):b := -8.86912310771059E-01+I*(4.51458130858466E-02):c := -2.83631534362566E-02+I*(-4.87502483904766E-01):d := -5.80520515967410E-01+I*(1.40584459436735E-01):e := 1.04331125458073E+00+I*(8.51576201331645E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.63290667548923E-01+I*(-7.10093130316593E-05):b := -5.72068070916408E-01+I*(-1.15373436155901E-01):c := -3.14536288308390E-01+I*(-5.77887735231922E-01):d := -5.36166337219258E-01+I*(7.69380184625949E-02):e := 8.99277750797213E-01+I*(-4.68511169094193E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.51378359058602E-01+I*(-5.26870232248101E-02):b := -2.27703605998954E-01+I*(-3.59603386914256E-02):c := -4.75659108395625E-01+I*(-8.31075400071965E-01):d := -4.61277921401307E-01+I*(5.66923325671889E-02):e := 6.13431258059970E-01+I*(-9.05910323325592E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.51190038419982E-01+I*(3.03693896047652E-01):b := 8.32848234242956E-02+I*(3.09748102748595E-01):c := -2.34346065637807E-01+I*(-1.08542990754571E+00):d := -3.78871463007741E-01+I*(-2.17269795338666E-01):e := -7.09912428136395E+00+I*(-1.02101633483612E+01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.53032599491828E-01+I*(5.78268213261895E-01):b := 6.48764511367297E-02+I*(6.62670837318797E-01):c := -1.29835744249813E-02+I*(-1.28807048656203E+00):d := -3.45929117637745E-01+I*(-1.47034729291700E-01):e := -1.83328088762455E+00+I*(1.07766792736138E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.54555558430464E-01+I*(8.54067479582781E-01):b := -1.76079541119442E-01+I*(9.21192663365710E-01):c := 2.86844785294973E-01+I*(-1.30101310946695E+00):d := -3.65840047244258E-01+I*(-7.20566157964800E-02):e := -6.65615696673313E-01+I*(9.63811161667024E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.01837417198903E-01+I*(1.00204215313135E+00):b := -5.26837166639997E-01+I*(9.64348345331925E-01):c := 5.24845991788046E-01+I*(-1.11820177916201E+00):d := -4.29287706579059E-01+I*(-2.74185474463298E-02):e := -1.91832777571204E-01+I*(8.58554356591729E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.13127802728679E-01+I*(9.52953239598915E-01):b := -8.23273034207082E-01+I*(7.71944860003471E-01):c := 5.89656635447354E-01+I*(-8.25175948818537E-01):d := -5.06584230697207E-01+I*(-3.40071725191546E-02):e := 1.18628219878116E-01+I*(7.70043344242846E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.64828477196366E-02+I*(7.29769987189807E-01):b := -9.26681506868364E-01+I*(4.34009936492083E-01):c := 4.50951095814635E-01+I*(-5.59045661073580E-01):d := -5.61561716908644E-01+I*(-8.87396001189690E-02):e := 3.91396303829034E-01+I*(6.78931599067935E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.82736035136255E-02+I*(4.36922320111808E-01):b := -7.88676611008471E-01+I*(1.08667081237066E-01):c := 1.73631236424399E-01+I*(-4.44336235271698E-01):d := -5.68495588408340E-01+I*(-1.66005919088643E-01):e := 7.00232810018986E-01+I*(5.59991985762544E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.08593449884753E-01+I*(2.11436916429999E-01):b := -4.73832371153821E-01+I*(-5.18521680046816E-02):c := -1.12541898447734E-01+I*(-5.34721486598855E-01):d := -5.24141409660189E-01+I*(-2.29652360062783E-01):e := 1.16790398073203E+00+I*(3.45819649130522E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.96681141394432E-01+I*(1.58820902518221E-01):b := -1.29467906236367E-01+I*(2.75609294597937E-02):c := -2.73664718534969E-01+I*(-7.87909151438898E-01):d := -4.49252993842238E-01+I*(-2.49898045958189E-01):e := 2.29361764408131E+00+I*(-3.67327386483678E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.96730420444257E-01+I*(3.66280912471212E-01):b := 1.17707051224150E-01+I*(4.21552907871986E-01):c := -1.07356115521827E-01+I*(-9.22523151621436E-01):d := -1.72587337506989E-01+I*(-4.44402176679427E-01):e := 8.75211642570213E-01+I*(1.37376076412300E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.98572981516103E-01+I*(6.40855229685455E-01):b := 9.92986789365841E-02+I*(7.74475642442187E-01):c := 1.14006375690998E-01+I*(-1.12516373063776E+00):d := -1.39644992136993E-01+I*(-3.74167110632462E-01):e := -4.37604543262630E-02+I*(1.21482501540528E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.00095940454739E-01+I*(9.16654496006341E-01):b := -1.41657313319588E-01+I*(1.03299746848910E+00):c := 4.13834735410953E-01+I*(-1.13810635354267E+00):d := -1.59555921743506E-01+I*(-2.99188997137242E-01):e := -6.56319398786522E-02+I*(7.71846408373606E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.47377799223178E-01+I*(1.06462916955491E+00):b := -4.92414938840142E-01+I*(1.07615315045532E+00):c := 6.51835941904026E-01+I*(-9.55295023237738E-01):d := -2.23003581078307E-01+I*(-2.54550928787091E-01):e := 4.43616672598498E-02+I*(5.87260501566925E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.41331815247046E-01+I*(1.01554025602247E+00):b := -7.88850806407227E-01+I*(8.83749665126861E-01):c := 7.16646585563334E-01+I*(-6.62269192894261E-01):d := -3.00300105196455E-01+I*(-2.61139553859916E-01):e := 1.52020903177718E-01+I*(4.92985644629644E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.30942465695362E-01+I*(7.92357003613367E-01):b := -8.92259279068509E-01+I*(5.45814741615473E-01):c := 5.77941045930614E-01+I*(-3.96138905149305E-01):d := -3.55277591407892E-01+I*(-3.15871981459731E-01):e := 2.61099810605231E-01+I*(4.35378908048496E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.32733221489351E-01+I*(4.99509336535367E-01):b := -7.54254383208616E-01+I*(2.20471886360456E-01):c := 3.00621186540379E-01+I*(-2.81429479347423E-01):d := -3.62211462907588E-01+I*(-3.93138300429405E-01):e := 3.90372801800923E-01+I*(4.00884885715370E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.45866168090972E-01+I*(2.74023932853559E-01):b := -4.39410143353966E-01+I*(5.99526371187088E-02):c := 1.44480516682456E-02+I*(-3.71814730674580E-01):d := -3.17857284159436E-01+I*(-4.56784741403545E-01):e := 5.75778284167106E-01+I*(4.04430948607249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.42221523418707E-01+I*(2.21407918941781E-01):b := -9.50456784365119E-02+I*(1.39365734583184E-01):c := -1.46674768418990E-01+I*(-6.25002395514623E-01):d := -2.42968868341486E-01+I*(-4.77030427298951E-01):e := 8.82643836313376E-01+I*(5.68378852275145E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61572885411463E-01+I*(2.50661859013510E-01):b := 7.22092641132709E-02+I*(5.29326539078313E-01):c := -1.14790614145878E-01+I*(-7.16101770009842E-01):d := 1.31433351020960E-01+I*(-4.85798795310992E-01):e := 6.57872496302110E-01+I*(4.79295233602323E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.63415446483309E-01+I*(5.25236176227753E-01):b := 5.38008918257051E-02+I*(8.82249273648515E-01):c := 1.06571877066947E-01+I*(-9.18742349026161E-01):d := 1.64375696390956E-01+I*(-4.15563729264027E-01):e := 4.34611127406936E-01+I*(7.05094074462939E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64938405421945E-01+I*(8.01035442548638E-01):b := -1.87155100430467E-01+I*(1.14077109969543E+00):c := 4.06400236786902E-01+I*(-9.31684971931075E-01):d := 1.44464766784443E-01+I*(-3.40585615768806E-01):e := 2.18646091033499E-01+I*(5.89107273981328E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.77797358096164E-02+I*(9.49010116097207E-01):b := -5.37912725951022E-01+I*(1.18392678166164E+00):c := 6.44401443279975E-01+I*(-7.48873641626144E-01):d := 8.10171074496420E-02+I*(-2.95947547418656E-01):e := 1.86945894337646E-01+I*(4.48761770699007E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76489350279841E-01+I*(8.99921202564772E-01):b := -8.34348593518106E-01+I*(9.91523296333189E-01):c := 7.09212086939283E-01+I*(-4.55847811282668E-01):d := 3.72058333149386E-03+I*(-3.02536172491481E-01):e := 2.14333310899573E-01+I*(3.57361492172699E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.66100000728157E-01+I*(6.76737950155665E-01):b := -9.37757066179389E-01+I*(6.53588372821801E-01):c := 5.70506547306564E-01+I*(-1.89717523537711E-01):d := -5.12569028799432E-02+I*(-3.57268600091296E-01):e := 2.61883895753030E-01+I*(2.96063376274960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67890756522145E-01+I*(3.83890283077665E-01):b := -7.99752170319496E-01+I*(3.28245517566784E-01):c := 2.93186687916328E-01+I*(-7.50080977358290E-02):d := -5.81907743796388E-02+I*(-4.34534919060969E-01):e := 3.26140734758451E-01+I*(2.53759622952746E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.81023703123767E-01+I*(1.58404879395857E-01):b := -4.84907930464845E-01+I*(1.67726268325036E-01):c := 7.01355304419477E-03+I*(-1.65393349062986E-01):d := -1.38365956314872E-02+I*(-4.98181360035109E-01):e := 4.16891072616373E-01+I*(2.33446041487020E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.29360116140875E-02+I*(1.05788865484078E-01):b := -1.40543465547391E-01+I*(2.47139365789511E-01):c := -1.54109267043041E-01+I*(-4.18581013903029E-01):d := 6.10518201864631E-02+I*(-5.18427045930516E-01):e := 5.49616984415435E-01+I*(2.70827718064422E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.57502574483308E-02+I*(1.09361757500522E-02):b := -3.19196176675821E-02+I*(5.82640516555645E-01):c := -2.53170876978518E-01+I*(-5.62752621285110E-01):d := 3.90935943600289E-01+I*(-3.22089713303481E-01):e := 5.68250001438129E-01+I*(1.58228353382087E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.57592818520177E-01+I*(2.85510492964296E-01):b := -5.03279899551479E-02+I*(9.35563251125847E-01):c := -3.18083857656920E-02+I*(-7.65393200301430E-01):d := 4.23878288970285E-01+I*(-2.51854647256516E-01):e := 5.79351074748903E-01+I*(3.45276155788914E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.91157774588127E-02+I*(5.61309759285182E-01):b := -2.91283982211320E-01+I*(1.19408507717276E+00):c := 2.68019973954263E-01+I*(-7.78335823206344E-01):d := 4.03967359363772E-01+I*(-1.76876533761296E-01):e := 4.08618731309076E-01+I*(4.18665471483428E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.93602363772748E-01+I*(7.09284432833750E-01):b := -6.42041607731874E-01+I*(1.23724075913898E+00):c := 5.06021180447336E-01+I*(-5.95524492901412E-01):d := 3.40519700028971E-01+I*(-1.32238465411146E-01):e := 3.04142382932939E-01+I*(3.46419620483379E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.82311978242973E-01+I*(6.60195519301315E-01):b := -9.38477475298959E-01+I*(1.04483727381052E+00):c := 5.70831824106644E-01+I*(-3.02498662557936E-01):d := 2.63223175910823E-01+I*(-1.38827090483971E-01):e := 2.79137176894778E-01+I*(2.66450831380352E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.71922628691288E-01+I*(4.37012266892207E-01):b := -1.04188594796024E+00+I*(7.06902350299133E-01):c := 4.32126284473924E-01+I*(-3.63683748129787E-02):d := 2.08245689699386E-01+I*(-1.93559518083785E-01):e := 2.89171952097386E-01+I*(2.03021016128082E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.73713384485277E-01+I*(1.44164599814208E-01):b := -9.03881052100348E-01+I*(3.81559495044116E-01):c := 1.54806425083689E-01+I*(7.83410509889031E-02):d := 2.01311818199691E-01+I*(-2.70825837053459E-01):e := 3.19363130939181E-01+I*(1.52456287688420E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.86846331086899E-01+I*(-8.13208038676008E-02):b := -5.89036812245699E-01+I*(2.21040245802368E-01):c := -1.31366709788445E-01+I*(-1.20442003382539E-02):d := 2.45665996947842E-01+I*(-3.34472278027599E-01):e := 3.70820745804012E-01+I*(1.13349160439413E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.98758639577219E-01+I*(-1.33936817779379E-01):b := -2.44672347328244E-01+I*(3.00453343266844E-01):c := -2.92489529875680E-01+I*(-2.65231865178297E-01):d := 3.20554412765793E-01+I*(-3.54717963923005E-01):e := 4.54224619171819E-01+I*(9.77235016133316E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.28778120266316E-01+I*(-2.40725825865989E-01):b := -1.45956533069534E-01+I*(5.56548637723479E-01):c := -4.57747241115041E-01+I*(-5.34229476421491E-01):d := 4.84496293113068E-01+I*(-2.98762295519916E-02):e := 5.09059541736790E-01+I*(-4.24227831374015E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.30620681338163E-01+I*(3.38484913482543E-02):b := -1.64364905357100E-01+I*(9.09471372293681E-01):c := -2.36384749902215E-01+I*(-7.36870055437810E-01):d := 5.17438638483064E-01+I*(4.03588364949735E-02):e := 6.23440491730484E-01+I*(5.55317738050286E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.32143640276798E-01+I*(3.09647757669140E-01):b := -4.05320897613272E-01+I*(1.16799319834059E+00):c := 6.34436098177396E-02+I*(-7.49812678342724E-01):d := 4.97527708876551E-01+I*(1.15336949990194E-01):e := 5.69958776424072E-01+I*(2.28473837260545E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.20574500954763E-01+I*(4.57622431217709E-01):b := -7.56078523133827E-01+I*(1.21114888030681E+00):c := 3.01444816310813E-01+I*(-5.67001348037792E-01):d := 4.34080049541750E-01+I*(1.59975018340344E-01):e := 4.28187148103690E-01+I*(2.47970267948167E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.09284115424987E-01+I*(4.08533517685274E-01):b := -1.05251439070091E+00+I*(1.01874539497836E+00):c := 3.66255459970121E-01+I*(-2.73975517694316E-01):d := 3.56783525423602E-01+I*(1.53386393267519E-01):e := 3.54769022853737E-01+I*(1.89664027528046E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.98894765873302E-01+I*(1.85350265276166E-01):b := -1.15592286336219E+00+I*(6.80810471466966E-01):c := 2.27549920337401E-01+I*(-7.84522994935923E-03):d := 3.01806039212164E-01+I*(9.86539656677050E-02):e := 3.31066838380661E-01+I*(1.26810974810911E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.00685521667291E-01+I*(-1.07497401801833E-01):b := -1.01791796750230E+00+I*(3.55467616211950E-01):c := -4.97699390528346E-02+I*(1.06864195852522E-01):d := 2.94872167712469E-01+I*(2.13876466980308E-02):e := 3.34075662499952E-01+I*(6.98985115357574E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.13818468268913E-01+I*(-3.32982805483642E-01):b := -7.03073727647650E-01+I*(1.94948366970202E-01):c := -3.35943073924968E-01+I*(1.64789445253655E-02):d := 3.39226346460620E-01+I*(-4.22587942761090E-02):e := 3.58336172691299E-01+I*(1.75750363412835E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.25730776759234E-01+I*(-3.85598819395420E-01):b := -3.58709262730196E-01+I*(2.74361464434678E-01):c := -4.97065894012203E-01+I*(-2.36708720314677E-01):d := 4.14114762278571E-01+I*(-6.25044801715154E-02):e := 4.11007594630143E-01+I*(-2.79392811727896E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46485925238595E-01+I*(-3.86568698366867E-01):b := -2.16542341996869E-01+I*(4.63259582666318E-01):c := -6.32796152162938E-01+I*(-6.43878631900116E-01):d := 3.68336472214804E-01+I*(2.54111719305031E-01):e := 4.56686351524038E-01+I*(-2.13347114820744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.48328486310441E-01+I*(-1.11994381152624E-01):b := -2.34950714284435E-01+I*(8.16182317236520E-01):c := -4.11433660950112E-01+I*(-8.46519210916435E-01):d := 4.01278817584801E-01+I*(3.24346785351996E-01):e := 6.10777978730273E-01+I*(-2.27400814153157E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.49851445249077E-01+I*(1.63804885168262E-01):b := -4.75906706540608E-01+I*(1.07470414328343E+00):c := -1.11605301230158E-01+I*(-8.59461833821349E-01):d := 3.81367887978288E-01+I*(3.99324898847217E-01):e := 7.34268535977841E-01+I*(-3.84739992221160E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.71333040175158E-02+I*(3.11779558716830E-01):b := -8.26664332061162E-01+I*(1.11785982524965E+00):c := 1.26395905262915E-01+I*(-6.76650503516418E-01):d := 3.17920228643486E-01+I*(4.43962967197367E-01):e := 6.00209790498107E-01+I*(1.26291180064159E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.91576310452709E-01+I*(2.62690645184395E-01):b := -1.12310019962825E+00+I*(9.25456339921194E-01):c := 1.91206548922223E-01+I*(-3.83624673172942E-01):d := 2.40623704525339E-01+I*(4.37374342124542E-01):e := 4.63207702193470E-01+I*(1.12433341237903E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.81186960901024E-01+I*(3.95073927752878E-02):b := -1.22650867228953E+00+I*(5.87521416409806E-01):c := 5.25010092895038E-02+I*(-1.17494385427985E-01):d := 1.85646218313901E-01+I*(3.82641914524727E-01):e := 3.96036317558288E-01+I*(5.29783763583175E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.82977716695013E-01+I*(-2.53340274302712E-01):b := -1.08850377642964E+00+I*(2.62178561154789E-01):c := -2.24818850100732E-01+I*(-2.78495962610319E-03):d := 1.78712346814206E-01+I*(3.05375595555053E-01):e := 3.68115721668568E-01+I*(-1.04540353952022E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.96110663296635E-01+I*(-4.78825677984520E-01):b := -7.73659536574986E-01+I*(1.01659311913041E-01):c := -5.10991984972865E-01+I*(-9.31702109532599E-02):d := 2.23066525562357E-01+I*(2.41729154580913E-01):e := 3.64747728264095E-01+I*(-7.49545473553391E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.19770282130448E-02+I*(-5.31441691896299E-01):b := -4.29295071657532E-01+I*(1.81072409377516E-01):c := -6.72114805060100E-01+I*(-3.46357875793303E-01):d := 2.97954941380308E-01+I*(2.21483468685507E-01):e := 3.87483100329267E-01+I*(-1.43783878581719E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.07005770865897E-01+I*(-3.58350940846440E-01):b := -2.10649159978604E-01+I*(3.46424337037766E-01):c := -6.96410279190954E-01+I*(-8.40394029257916E-01):d := 9.68089520764055E-02+I*(3.96993015822898E-01):e := 3.96874371518553E-01+I*(-4.01695397492679E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.08848331937743E-01+I*(-8.37766236321973E-02):b := -2.29057532266170E-01+I*(6.99347071607968E-01):c := -4.75047787978129E-01+I*(-1.04303460827423E+00):d := 1.29751297446402E-01+I*(4.67228081869863E-01):e := 5.21802086877412E-01+I*(-5.63230481564397E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.10371290876379E-01+I*(1.92022642688689E-01):b := -4.70013524522342E-01+I*(9.57868897654881E-01):c := -1.75219428258174E-01+I*(-1.05597723117915E+00):d := 1.09840367839889E-01+I*(5.42206195365084E-01):e := 9.04973112803318E-01+I*(-5.51970752768920E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.57653149644818E-01+I*(3.39997316237257E-01):b := -8.20771150042897E-01+I*(1.00102457962110E+00):c := 6.27817782348992E-02+I*(-8.73165900874217E-01):d := 4.63927085050873E-02+I*(5.86844263715234E-01):e := 9.52841424800795E-01+I*(-7.70968642170552E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.89435351745934E-02+I*(2.90908402704822E-01):b := -1.11720701760998E+00+I*(8.08621094292642E-01):c := 1.27592421894207E-01+I*(-5.80140070530741E-01):d := -3.09038156130607E-02+I*(5.80255638642409E-01):e := 6.71264824926156E-01+I*(3.37870130551514E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.20667115273722E-01+I*(6.77251502957146E-02):b := -1.22061549027126E+00+I*(4.70686170781254E-01):c := -1.11131177385124E-02+I*(-3.14009782785784E-01):d := -8.58813018244979E-02+I*(5.25523211042595E-01):e := 5.17628878110849E-01+I*(-2.36893611222785E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.22457871067711E-01+I*(-2.25122516782285E-01):b := -1.08261059441137E+00+I*(1.45343315526237E-01):c := -2.88432977128748E-01+I*(-1.99300356983903E-01):d := -9.28151733241934E-02+I*(4.48256892072921E-01):e := 4.39385087857375E-01+I*(-1.01056536417674E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.44091823306675E-02+I*(-4.50607920464093E-01):b := -7.67766354556720E-01+I*(-1.51759337155105E-02):c := -5.74606112000881E-01+I*(-2.89685608311059E-01):d := -4.84609945760417E-02+I*(3.84610451098781E-01):e := 3.96527232012329E-01+I*(-1.83331244446240E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.52496873840347E-01+I*(-5.03223934375872E-01):b := -4.23401889639266E-01+I*(6.42371637489648E-02):c := -7.35728932088117E-01+I*(-5.42873273151102E-01):d := 2.64274212419086E-02+I*(3.64364765203374E-01):e := 3.78263182970800E-01+I*(-2.78204474969461E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.43950616382670E-01+I*(-1.81783432924708E-01):b := -3.62884848494880E-01+I*(1.40774082932081E-01):c := -2.12423356701394E-01+I*(-1.25732875482954E+00):d := -4.19382993054603E-01+I*(4.11800649581501E-01):e := -3.22775667691979E-02+I*(-5.30886790153874E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.45793177454516E-01+I*(9.27908842895351E-02):b := -3.81293220782445E-01+I*(4.93696817502282E-01):c := 8.93913451143064E-03+I*(-1.45996933384586E+00):d := -3.86440647684607E-01+I*(4.82035715628466E-01):e := -1.75619082937402E-01+I*(-5.83084452245130E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.47316136393152E-01+I*(3.68590150610421E-01):b := -6.22249213038618E-01+I*(7.52218643549195E-01):c := 3.08767494231386E-01+I*(-1.47291195675078E+00):d := -4.06351577291120E-01+I*(5.57013829123687E-01):e := -3.60660765713039E-01+I*(-7.22290636128745E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.94597995161591E-01+I*(5.16564824158990E-01):b := -9.73006838559172E-01+I*(7.95374325515410E-01):c := 5.46768700724459E-01+I*(-1.29010062644585E+00):d := -4.69799236625921E-01+I*(6.01651897473836E-01):e := -5.34132591589135E-01+I*(-1.18516833487852E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.05888380691366E-01+I*(4.67475910626555E-01):b := -1.26944270612626E+00+I*(6.02970840186956E-01):c := 6.11579344383767E-01+I*(-9.97074796102370E-01):d := -5.47095760744069E-01+I*(5.95063272401012E-01):e := 4.10242105273167E-01+I*(-1.74821408455377E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.16277730243051E-01+I*(2.44292658217447E-01):b := -1.37285117878754E+00+I*(2.65035916675569E-01):c := 4.72873804751048E-01+I*(-7.30944508357413E-01):d := -6.02073246955506E-01+I*(5.40330844801198E-01):e := 6.93053743634127E-01+I*(-8.58752916569127E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.14486974449062E-01+I*(-4.85550088605523E-02):b := -1.23484628292765E+00+I*(-6.03069385794487E-02):c := 1.95553945360812E-01+I*(-6.16235082555531E-01):d := -6.09007118455202E-01+I*(4.63064525831524E-01):e := 4.25733583064974E-01+I*(-5.90797842940690E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.01354027847441E-01+I*(-2.74040412542361E-01):b := -9.20002043072996E-01+I*(-2.20826187821196E-01):c := -9.06191895113217E-02+I*(-7.06620333882688E-01):d := -5.64652939707050E-01+I*(3.99418084857384E-01):e := 2.39213545232659E-01+I*(-5.24854000179809E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.89441719357120E-01+I*(-3.26656426454139E-01):b := -5.75637578155542E-01+I*(-1.41413090356721E-01):c := -2.51742009598557E-01+I*(-9.59807998722731E-01):d := -4.89764523889100E-01+I*(3.79172398961977E-01):e := 9.75888745621178E-02+I*(-5.13728025407409E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.61400346443186E-01+I*(7.96784930338724E-02):b := -2.46801252456665E-01+I*(1.26289506782914E-01):c := -2.99399470294465E-02+I*(-1.35410098096251E+00):d := -6.07243860684289E-01+I*(1.69209319356043E-01):e := -2.63880294213809E-01+I*(-5.94477941901601E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.63242907515032E-01+I*(3.54252810248115E-01):b := -2.65209624744231E-01+I*(4.79212241353116E-01):c := 1.91422544183378E-01+I*(-1.55674155997883E+00):d := -5.74301515314292E-01+I*(2.39444385403009E-01):e := -4.51271585300210E-01+I*(-5.05281373165362E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.64765866453668E-01+I*(6.30052076569001E-01):b := -5.06165617000403E-01+I*(7.37734067400029E-01):c := 4.91250903903334E-01+I*(-1.56968418288375E+00):d := -5.94212444920805E-01+I*(3.14422498898229E-01):e := -6.92317451886404E-01+I*(-4.14692560670357E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.12047725222107E-01+I*(7.78026750117569E-01):b := -8.56923242520957E-01+I*(7.80889749366244E-01):c := 7.29252110396407E-01+I*(-1.38687285257881E+00):d := -6.57660104255607E-01+I*(3.59060567248379E-01):e := -1.12392743103351E+00+I*(-3.12885145881449E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.23338110751883E-01+I*(7.28937836585135E-01):b := -1.15335911008804E+00+I*(5.88486264037790E-01):c := 7.94062754055716E-01+I*(-1.09384702223534E+00):d := -7.34956628373755E-01+I*(3.52471942175554E-01):e := -2.52828418569748E+00+I*(-4.67492357598078E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.33727460303567E-01+I*(5.05754584176028E-01):b := -1.25676758274932E+00+I*(2.50551340526402E-01):c := 6.55357214422996E-01+I*(-8.27716734490382E-01):d := -7.89934114585192E-01+I*(2.97739514575739E-01):e := 1.02186790798365E+00+I*(-4.01843077740734E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.31936704509578E-01+I*(2.12906917098028E-01):b := -1.11876268688943E+00+I*(-7.47915147286150E-02):c := 3.78037355032760E-01+I*(-7.13007308688500E-01):d := -7.96867986084887E-01+I*(2.20473195606066E-01):e := 5.87542738995090E-01+I*(-1.28801851503046E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.18803757907957E-01+I*(-1.25784865837805E-02):b := -8.03918447034781E-01+I*(-2.35310763970363E-01):c := 9.18642201606267E-02+I*(-8.03392560015656E-01):d := -7.52513807336736E-01+I*(1.56826754631925E-01):e := 1.65178889695035E-01+I*(-8.72780976341943E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.06891449417636E-01+I*(-6.51945004955588E-02):b := -4.59553982117327E-01+I*(-1.55897666505887E-01):c := -6.92585999266086E-02+I*(-1.05658022485570E+00):d := -6.77625391518785E-01+I*(1.36581068736519E-01):e := -7.62421780412209E-02+I*(-7.02294218695194E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.06703128779016E-01+I*(2.91186418776903E-01):b := -1.48565552694078E-01+I*(1.89810774934134E-01):c := 1.72054442831209E-01+I*(-1.31093473232945E+00):d := -5.95218933125219E-01+I*(-1.37381059169335E-01):e := -6.97811015765118E-01+I*(-7.03044370427985E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.08545689850862E-01+I*(5.65760735991146E-01):b := -1.66973924981644E-01+I*(5.42733509504336E-01):c := 3.93416934044035E-01+I*(-1.51357531134576E+00):d := -5.62276587755223E-01+I*(-6.71459931223696E-02):e := -8.13446666043237E-01+I*(-3.13161376209321E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.10068648789498E-01+I*(8.41560002312032E-01):b := -4.07929917237816E-01+I*(8.01255335551248E-01):c := 6.93245293763990E-01+I*(-1.52651793425068E+00):d := -5.82187517361736E-01+I*(7.83212037285073E-03):e := -8.67475915946385E-01+I*(3.92222907163866E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.57350507557937E-01+I*(9.89534675860600E-01):b := -7.58687542758370E-01+I*(8.44411017517463E-01):c := 9.31246500257063E-01+I*(-1.34370660394575E+00):d := -6.45635176696537E-01+I*(5.24701887230009E-02):e := -8.74322846968142E-01+I*(4.39374667132726E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.68640893087713E-01+I*(9.40445762328165E-01):b := -1.05512341032545E+00+I*(6.52007532189009E-01):c := 9.96057143916371E-01+I*(-1.05068077360227E+00):d := -7.22931700814685E-01+I*(4.58815636501761E-02):e := -7.79531949642382E-01+I*(1.02540356238063E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.09697573606028E-02+I*(7.17262509919058E-01):b := -1.15853188298674E+00+I*(3.14072608677621E-01):c := 8.57351604283651E-01+I*(-7.84550485857314E-01):d := -7.77909187026122E-01+I*(-8.85086394963831E-03):e := -1.34528257729862E-01+I*(2.18944907636777E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.27605131545919E-02+I*(4.24414842841058E-01):b := -1.02052698712684E+00+I*(-1.12702465773959E-02):c := 5.80031744893416E-01+I*(-6.69841060055432E-01):d := -7.84843058525818E-01+I*(-8.61171829193122E-02):e := 4.62778109039733E+00+I*(1.03676026483698E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.64106540243787E-01+I*(1.98929439159250E-01):b := -7.05682747272194E-01+I*(-1.71789495819143E-01):c := 2.93858610021283E-01+I*(-7.60226311382589E-01):d := -7.40488879777666E-01+I*(-1.49763623893452E-01):e := 6.44941526089545E-01+I*(-2.20742747585902E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52194231753466E-01+I*(1.46313425247472E-01):b := -3.61318282354740E-01+I*(-9.23763983546680E-02):c := 1.32735789934047E-01+I*(-1.01341397622263E+00):d := -6.65600463959716E-01+I*(-1.70009309788858E-01):e := -4.18415391746609E-01+I*(-1.25181404937885E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52243510803291E-01+I*(3.53773435200463E-01):b := -1.14143324894223E-01+I*(3.01615580057524E-01):c := 2.99044392947189E-01+I*(-1.14802797640517E+00):d := -3.88934807624467E-01+I*(-3.64513440510097E-01):e := -2.57792028653709E+00+I*(-1.02003451351806E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54086071875137E-01+I*(6.28347752414706E-01):b := -1.32551697181789E-01+I*(6.54538314627725E-01):c := 5.20406884160014E-01+I*(-1.35066855542149E+00):d := -3.55992462254471E-01+I*(-2.94278374463131E-01):e := -1.35636661724828E+00+I*(3.34980506012675E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.55609030813773E-01+I*(9.04147018735592E-01):b := -3.73507689437961E-01+I*(9.13060140674639E-01):c := 8.20235243879969E-01+I*(-1.36361117832640E+00):d := -3.75903391860984E-01+I*(-2.19300260967911E-01):e := -7.71305295412690E-01+I*(6.33070908338750E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.02890889582212E-01+I*(1.05212169228416E+00):b := -7.24265314958515E-01+I*(9.56215822640854E-01):c := 1.05823645037304E+00+I*(-1.18079984802147E+00):d := -4.39351051195785E-01+I*(-1.74662192617761E-01):e := -3.90545136076957E-01+I*(7.57794115786134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.58187248880125E-02+I*(1.00303277875173E+00):b := -1.02070118252560E+00+I*(7.63812337312400E-01):c := 1.12304709403235E+00+I*(-8.87774017677996E-01):d := -5.16647575313933E-01+I*(-1.81250817690586E-01):e := -6.47314911082872E-02+I*(8.26994073593055E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.75429375336328E-01+I*(7.79849526342618E-01):b := -1.12410965518688E+00+I*(4.25877413801012E-01):c := 9.84341554399632E-01+I*(-6.21643729933039E-01):d := -5.71625061525370E-01+I*(-2.35983245290400E-01):e := 2.89820401793960E-01+I*(8.65598735540605E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.77220131130317E-01+I*(4.87001859264618E-01):b := -9.86104759326989E-01+I*(1.00534558545994E-01):c := 7.07021695009396E-01+I*(-5.06934304131157E-01):d := -5.78558933025066E-01+I*(-3.13249564260074E-01):e := 7.91261471351491E-01+I*(8.57059550740414E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.03530777319385E-02+I*(2.61516455582810E-01):b := -6.71260519472339E-01+I*(-5.99846906957531E-02):c := 4.20848560137262E-01+I*(-5.97319555458314E-01):d := -5.34204754276914E-01+I*(-3.76896005234214E-01):e := 1.80714485706833E+00+I*(6.04202443440620E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.97734613777741E-01+I*(2.08900441671031E-01):b := -3.26896054554885E-01+I*(1.94284067687222E-02):c := 2.59725740050027E-01+I*(-8.50507220298357E-01):d := -4.59316338458964E-01+I*(-3.97141691129620E-01):e := 3.71005029772064E+00+I*(-3.68732715556999E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.17085975770496E-01+I*(2.38154381742760E-01):b := -1.59641112005102E-01+I*(4.09389211263851E-01):c := 2.91609894323138E-01+I*(-9.41606594793576E-01):d := -8.49141190965178E-02+I*(-4.05910059141661E-01):e := 2.90730755816842E+00+I*(6.47249460339316E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.18928536842342E-01+I*(5.12728698957004E-01):b := -1.78049484292668E-01+I*(7.62311945834053E-01):c := 5.12972385535964E-01+I*(-1.14424717380990E+00):d := -5.19717737265215E-02+I*(-3.35674993094696E-01):e := -2.21580287068226E-01+I*(2.63186712792226E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20451495780978E-01+I*(7.88527965277889E-01):b := -4.19005476548840E-01+I*(1.02083377188097E+00):c := 8.12800745255918E-01+I*(-1.15718979671481E+00):d := -7.18827033330347E-02+I*(-2.60696879599476E-01):e := -1.54785077014215E-01+I*(1.16786619343114E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.22666454505825E-02+I*(9.36502638826457E-01):b := -7.69763102069394E-01+I*(1.06398945384718E+00):c := 1.05080195174899E+00+I*(-9.74378466409877E-01):d := -1.35330362667836E-01+I*(-2.16058811249325E-01):e := 7.98832290904142E-02+I*(7.93012232138173E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.20976259920807E-01+I*(8.87413725294024E-01):b := -1.06619896963648E+00+I*(8.71585968518728E-01):c := 1.11561259540830E+00+I*(-6.81352636066402E-01):d := -2.12626886785984E-01+I*(-2.22647436322151E-01):e := 2.46886613650160E-01+I*(6.10662246522225E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.10586910369123E-01+I*(6.64230472884915E-01):b := -1.16960744229776E+00+I*(5.33651045007339E-01):c := 9.76907055775580E-01+I*(-4.15222348321444E-01):d := -2.67604372997421E-01+I*(-2.77379863921965E-01):e := 3.93248121477360E-01+I*(4.84098381396365E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.12377666163111E-01+I*(3.71382805806916E-01):b := -1.03160254643787E+00+I*(2.08308189752322E-01):c := 6.99587196385344E-01+I*(-3.00512922519563E-01):d := -2.74538244497117E-01+I*(-3.54646182891639E-01):e := 5.53838069347036E-01+I*(3.71804073172632E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.25510612764733E-01+I*(1.45897402125108E-01):b := -7.16758306583218E-01+I*(4.77889405105744E-02):c := 4.13414061513211E-01+I*(-3.90898173846720E-01):d := -2.30184065748965E-01+I*(-4.18292623865779E-01):e := 7.81189414102862E-01+I*(2.50391599491046E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.74229212550538E-02+I*(9.32813882133291E-02):b := -3.72393841665764E-01+I*(1.27202037975050E-01):c := 2.52291241425976E-01+I*(-6.44085838686763E-01):d := -1.55295649931015E-01+I*(-4.38538309761185E-01):e := 1.24222408035498E+00+I*(1.10275168897011E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.11263347807364E-01+I*(-1.57130152069692E-03):b := -2.63769993785955E-01+I*(4.62703188741184E-01):c := 1.53229631490499E-01+I*(-7.88257446068844E-01):d := 1.74588473482812E-01+I*(-2.42200977134151E-01):e := 9.92577202458026E-01+I*(-2.00722068103438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.13105908879210E-01+I*(2.73003015693546E-01):b := -2.82178366073521E-01+I*(8.15625923311386E-01):c := 3.74592122703324E-01+I*(-9.90898025085163E-01):d := 2.07530818852808E-01+I*(-1.71965911087185E-01):e := 1.59287072938982E+00+I*(2.84305344188791E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.14628867817846E-01+I*(5.48802282014432E-01):b := -5.23134358329693E-01+I*(1.07414774935830E+00):c := 6.74420482423279E-01+I*(-1.00384064799008E+00):d := 1.87619889246295E-01+I*(-9.69877975919651E-02):e := 8.70120320486907E-01+I*(9.42769234278557E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.38089273413715E-01+I*(6.96776955563000E-01):b := -8.73891983850248E-01+I*(1.11730343132451E+00):c := 9.12421688916352E-01+I*(-8.21029317685145E-01):d := 1.24172229911494E-01+I*(-5.23497292418148E-02):e := 4.95306412545884E-01+I*(6.33517890769040E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.26798887883939E-01+I*(6.47688042030566E-01):b := -1.17032785141733E+00+I*(9.24899945996060E-01):c := 9.77232332575660E-01+I*(-5.28003487341669E-01):d := 4.68757057933460E-02+I*(-5.89383543146401E-02):e := 4.38264045553005E-01+I*(4.12745445646928E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.16409538332255E-01+I*(4.24504789621458E-01):b := -1.27373632407861E+00+I*(5.86965022484671E-01):c := 8.38526792942941E-01+I*(-2.61873199596712E-01):d := -8.10178041809129E-03+I*(-1.13670781914454E-01):e := 4.48873852243135E-01+I*(2.65280715837935E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.18200294126244E-01+I*(1.31657122543459E-01):b := -1.13573142821872E+00+I*(2.61622167229654E-01):c := 5.61206933552705E-01+I*(-1.47163773794831E-01):d := -1.50356519177869E-02+I*(-1.90937100884128E-01):e := 4.86542612770941E-01+I*(1.46330033128226E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.31333240727865E-01+I*(-9.38282811383498E-02):b := -8.20887188364071E-01+I*(1.01102917987907E-01):c := 2.75033798680572E-01+I*(-2.37549025121987E-01):d := 2.93185268303647E-02+I*(-2.54583541858268E-01):e := 5.53418057191203E-01+I*(3.17692885565446E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.43245549218186E-01+I*(-1.46444295050128E-01):b := -4.76522723446617E-01+I*(1.80516015452382E-01):c := 1.13910978593336E-01+I*(-4.90736689962030E-01):d := 1.04206942648315E-01+I*(-2.74829227753674E-01):e := 6.82091161098115E-01+I*(-9.37586805321173E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.84291210625350E-01+I*(-2.53233303136738E-01):b := -3.77806909187907E-01+I*(4.36611309909018E-01):c := -5.13467326460243E-02+I*(-7.59734301205224E-01):d := 2.68148822995590E-01+I*(5.00125066173390E-02):e := 5.55616562795112E-01+I*(-3.51393968111175E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.86133771697196E-01+I*(2.13410140775050E-02):b := -3.96215281475473E-01+I*(7.89534044479220E-01):c := 1.70015758566801E-01+I*(-9.62374880221544E-01):d := 3.01091168365587E-01+I*(1.20247572664304E-01):e := 8.29483475398557E-01+I*(-4.55655344276549E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87656730635832E-01+I*(2.97140280398391E-01):b := -6.37171273731645E-01+I*(1.04805587052613E+00):c := 4.69844118286756E-01+I*(-9.75317503126458E-01):d := 2.81180238759074E-01+I*(1.95225686159525E-01):e := 1.17828639270610E+00+I*(-6.20051423736913E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.50614105957289E-02+I*(4.45114953946959E-01):b := -9.87928899252200E-01+I*(1.09121155249235E+00):c := 7.07845324779829E-01+I*(-7.92506172821526E-01):d := 2.17732579424272E-01+I*(2.39863754509675E-01):e := 8.30030268835205E-01+I*(2.77535123520810E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.53771025065954E-01+I*(3.96026040414525E-01):b := -1.28436476681928E+00+I*(8.98808067163893E-01):c := 7.72655968439137E-01+I*(-4.99480342478050E-01):d := 1.40436055306124E-01+I*(2.33275129436850E-01):e := 5.86502922234728E-01+I*(2.00307774442522E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.43381675514269E-01+I*(1.72842788005417E-01):b := -1.38777323948057E+00+I*(5.60873143652505E-01):c := 6.33950428806417E-01+I*(-2.33350054733093E-01):d := 8.54585690946869E-02+I*(1.78542701837035E-01):e := 4.91624464242017E-01+I*(8.95112584295058E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.45172431308258E-01+I*(-1.20004879072583E-01):b := -1.24976834362067E+00+I*(2.35530288397488E-01):c := 3.56630569416181E-01+I*(-1.18640628931211E-01):d := 7.85246975949913E-02+I*(1.01276382867361E-01):e := 4.53786481768527E-01+I*(-1.03955687641846E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.58305377909879E-01+I*(-3.45490282754391E-01):b := -9.34924103766023E-01+I*(7.50110391557408E-02):c := 7.04574345440486E-02+I*(-2.09025880258368E-01):d := 1.22878876343143E-01+I*(3.76299418932213E-02):e := 4.45756172988178E-01+I*(-1.08127831630303E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.02176864002001E-02+I*(-3.98106296666169E-01):b := -5.90559638848569E-01+I*(1.54424136620216E-01):c := -9.06653855431869E-02+I*(-4.62213545098411E-01):d := 1.97767292161093E-01+I*(1.73842559978151E-02):e := 4.68421961442032E-01+I*(-2.17363375063767E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.01999015597628E-01+I*(-3.99076175637617E-01):b := -4.48392718115242E-01+I*(3.43322254851857E-01):c := -2.26395643693922E-01+I*(-8.69383456683850E-01):d := 1.51989002097327E-01+I*(3.34000455474362E-01):e := 3.23252467165856E-01+I*(-4.25475027909332E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.03841576669474E-01+I*(-1.24501858423373E-01):b := -4.66801090402808E-01+I*(6.96244989422058E-01):c := -5.03315248109654E-03+I*(-1.07202403570017E+00):d := 1.84931347467324E-01+I*(4.04235521521327E-01):e := 3.85708060419620E-01+I*(-5.91962780760419E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.05364535608110E-01+I*(1.51297407897512E-01):b := -7.07757082658980E-01+I*(9.54766815468971E-01):c := 2.94795207238858E-01+I*(-1.08496665860508E+00):d := 1.65020417860810E-01+I*(4.79213635016547E-01):e := 6.92286425081357E-01+I*(-7.21005202456973E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.52646394376549E-01+I*(2.99272081446081E-01):b := -1.05851470817954E+00+I*(9.97922497435186E-01):c := 5.32796413731932E-01+I*(-9.02155328300151E-01):d := 1.01572758526009E-01+I*(5.23851703366698E-01):e := 9.64592777601894E-01+I*(-3.26427021484826E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.36063220093675E-01+I*(2.50183167913646E-01):b := -1.35495057574662E+00+I*(8.05519012106732E-01):c := 5.97607057391239E-01+I*(-6.09129497956676E-01):d := 2.42762344078612E-02+I*(5.17263078293873E-01):e := 7.18850928129201E-01+I*(-8.14505245205917E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.25673870541990E-01+I*(2.69999155045386E-02):b := -1.45835904840790E+00+I*(4.67584088595344E-01):c := 4.58901517758520E-01+I*(-3.42999210211718E-01):d := -3.07012518035763E-02+I*(4.62530650694058E-01):e := 5.34389414963563E-01+I*(-9.37998048914010E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.27464626335979E-01+I*(-2.65847751573461E-01):b := -1.32035415254801E+00+I*(1.42241233340327E-01):c := 1.81581658368284E-01+I*(-2.28289784409837E-01):d := -3.76351233032717E-02+I*(3.85264331724384E-01):e := 4.33384766135626E-01+I*(-1.53881945036938E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.40597572937601E-01+I*(-4.91333155255269E-01):b := -1.00550991269336E+00+I*(-1.82780159014206E-02):c := -1.04591476503849E-01+I*(-3.18675035736993E-01):d := 6.71905544487980E-03+I*(3.21617890750244E-01):e := 3.72147788384165E-01+I*(-2.25539962801760E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.47490118572078E-01+I*(-5.43949169167048E-01):b := -6.61145447775904E-01+I*(6.11350815630547E-02):c := -2.65714296591084E-01+I*(-5.71862700577036E-01):d := 8.16074712628303E-02+I*(3.01372204854838E-01):e := 3.34210591158971E-01+I*(-3.11087139802610E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.62518861224930E-01+I*(-3.70858418117190E-01):b := -4.42499536096977E-01+I*(2.26487009223305E-01):c := -2.90009770721938E-01+I*(-1.06589885404165E+00):d := -1.19538518041072E-01+I*(4.76881751992229E-01):e := 1.45399025098751E-01+I*(-4.79396649221600E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.64361422296776E-01+I*(-9.62841009029468E-02):b := -4.60907908384543E-01+I*(5.79409743793507E-01):c := -6.86472795091130E-02+I*(-1.26853943305797E+00):d := -8.65961726710753E-02+I*(5.47116818039194E-01):e := 8.36922381810639E-02+I*(-6.11240182321175E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.65884381235412E-01+I*(1.79515165417939E-01):b := -7.01863900640715E-01+I*(8.37931569840420E-01):c := 2.31181080210842E-01+I*(-1.28148205596288E+00):d := -1.06507102277589E-01+I*(6.22094931534415E-01):e := 1.05900344439644E-01+I*(-8.62878933391880E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.13166240003852E-01+I*(3.27489838966507E-01):b := -1.05262152616127E+00+I*(8.81087251806635E-01):c := 4.69182286703915E-01+I*(-1.09867072565795E+00):d := -1.69954761612390E-01+I*(6.66732999884565E-01):e := 5.53021474145144E-01+I*(-1.07680769737969E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.24456625533627E-01+I*(2.78400925434073E-01):b := -1.34905739372835E+00+I*(6.88683766478181E-01):c := 5.33992930363223E-01+I*(-8.05644895314475E-01):d := -2.47251285730538E-01+I*(6.60144374811740E-01):e := 8.16645761135232E-01+I*(-5.72850381888191E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.51540249146881E-02+I*(5.52176730249654E-02):b := -1.45246586638964E+00+I*(3.50748842966793E-01):c := 3.95287390730504E-01+I*(-5.39514607569518E-01):d := -3.02228771941975E-01+I*(6.05411947211926E-01):e := 5.90044713792163E-01+I*(-3.45223494561123E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.69447807086772E-02+I*(-2.37629994053034E-01):b := -1.31446097052974E+00+I*(2.54059877117756E-02):c := 1.17967531340268E-01+I*(-4.24805181767636E-01):d := -3.09162643441671E-01+I*(5.28145628242252E-01):e := 4.20784731611410E-01+I*(-3.22734029733856E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.19922272689701E-01+I*(-4.63115397734842E-01):b := -9.99616730675093E-01+I*(-1.35113261529972E-01):c := -1.68205603531865E-01+I*(-5.15190433094793E-01):d := -2.64808464693519E-01+I*(4.64499187268111E-01):e := 3.07676735449310E-01+I*(-3.50943426914784E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.08009964199381E-01+I*(-5.15731411646621E-01):b := -6.55252265757639E-01+I*(-5.57001640654968E-02):c := -3.29328423619101E-01+I*(-7.68378097934836E-01):d := -1.89920048875569E-01+I*(4.44253501372705E-01):e := 2.20658770008010E-01+I*(-4.01731845207076E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.94515762190643E-01+I*(-1.55681589727206E-01):b := -4.63398312497355E-01+I*(-1.00133789632781E-01):c := 2.43849201787541E-01+I*(-1.16884626133745E+00):d := -6.36466260084109E-01+I*(3.33933498813271E-01):e := -2.13593116805759E-01+I*(-3.99238676857471E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.96358323262489E-01+I*(1.18892727487037E-01):b := -4.81806684784921E-01+I*(2.52788944937421E-01):c := 4.65211693000366E-01+I*(-1.37148684035377E+00):d := -6.03523914714112E-01+I*(4.04168564860236E-01):e := -3.00498806974550E-01+I*(-3.52333108742609E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.97881282201125E-01+I*(3.94691993807923E-01):b := -7.22762677041094E-01+I*(5.11310770984334E-01):c := 7.65040052720321E-01+I*(-1.38442946325868E+00):d := -6.23434844320625E-01+I*(4.79146678355457E-01):e := -4.13327844627155E-01+I*(-3.28982356650702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.45163140969564E-01+I*(5.42666667356491E-01):b := -1.07352030256165E+00+I*(5.54466452950549E-01):c := 1.00304125921339E+00+I*(-1.20161813295375E+00):d := -6.86882503655426E-01+I*(5.23784746705607E-01):e := -5.80396416636267E-01+I*(-3.60229987026406E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56453526499339E-01+I*(4.93577753824057E-01):b := -1.36995617012873E+00+I*(3.62062967622095E-01):c := 1.06785190287270E+00+I*(-9.08592302610275E-01):d := -7.64179027773575E-01+I*(5.17196121632783E-01):e := -7.87607330310998E-01+I*(-6.02944413931887E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.66842876051024E-01+I*(2.70394501414949E-01):b := -1.47336464279001E+00+I*(2.41280441107065E-02):c := 9.29146363239983E-01+I*(-6.42462014865318E-01):d := -8.19156513985012E-01+I*(4.62463694032968E-01):e := -4.90899094888675E-01+I*(-1.06198878569421E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.65052120257036E-01+I*(-2.24531656630503E-02):b := -1.33535974693012E+00+I*(-3.01214811144310E-01):c := 6.51826503849747E-01+I*(-5.27752589063437E-01):d := -8.26090385484707E-01+I*(3.85197375063294E-01):e := -8.80131764402097E-02+I*(-8.34762785628845E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.51919173655414E-01+I*(-2.47938569344859E-01):b := -1.02051550707547E+00+I*(-4.61734060386058E-01):c := 3.65653368977614E-01+I*(-6.18137840390593E-01):d := -7.81736206736556E-01+I*(3.21550934089154E-01):e := -7.56175243206923E-02+I*(-5.97125419108963E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.40006865165093E-01+I*(-3.00554583256637E-01):b := -6.76151042158017E-01+I*(-3.82320962921583E-01):c := 2.04530548890379E-01+I*(-8.71325505230636E-01):d := -7.06847790918605E-01+I*(3.01305248193748E-01):e := -1.38349735676648E-01+I*(-4.72456698633629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.11965492251159E-01+I*(1.05780336231374E-01):b := -3.47314716459141E-01+I*(-1.14618365781947E-01):c := 4.26332611459489E-01+I*(-1.26561848747042E+00):d := -8.24327127713794E-01+I*(9.13421685878140E-02):e := -3.38345879346169E-01+I*(-3.21862552411789E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01380805332301E+00+I*(3.80354653445617E-01):b := -3.65723088746707E-01+I*(2.38304368788255E-01):c := 6.47695102672314E-01+I*(-1.46825906648674E+00):d := -7.91384782343798E-01+I*(1.61577234634780E-01):e := -3.80328724736926E-01+I*(-2.33174519119956E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.15331012261641E-01+I*(6.56153919766503E-01):b := -6.06679081002880E-01+I*(4.96826194835167E-01):c := 9.47523462392269E-01+I*(-1.48120168939165E+00):d := -8.11295711950311E-01+I*(2.36555348130000E-01):e := -4.46001277199020E-01+I*(-1.58485550498854E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.62612871030081E-01+I*(8.04128593315071E-01):b := -9.57436706523434E-01+I*(5.39981876801383E-01):c := 1.18552466888534E+00+I*(-1.29839035908672E+00):d := -8.74743371285112E-01+I*(2.81193416480150E-01):e := -5.54015417756944E-01+I*(-9.49584119344308E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73903256559856E-01+I*(7.55039679782636E-01):b := -1.25387257409052E+00+I*(3.47578391472928E-01):c := 1.25033531254465E+00+I*(-1.00536452874324E+00):d := -9.52039895403260E-01+I*(2.74604791407325E-01):e := -7.54458474415948E-01+I*(-8.14177865413215E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.84292606111540E-01+I*(5.31856427373529E-01):b := -1.35728104675180E+00+I*(9.64346796153955E-03):c := 1.11162977291193E+00+I*(-7.39234240998286E-01):d := -1.00701738161470E+00+I*(2.19872363807510E-01):e := -1.02561054994034E+00+I*(-3.59559389472232E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.82501850317552E-01+I*(2.39008760295530E-01):b := -1.21927615089191E+00+I*(-3.15699387293476E-01):c := 8.34309913521695E-01+I*(-6.24524815196405E-01):d := -1.01395125311439E+00+I*(1.42606044837837E-01):e := -6.96166087749971E-01+I*(-7.82550194440335E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69368903715930E-01+I*(1.35233566137209E-02):b := -9.04431911037257E-01+I*(-4.76218636535224E-01):c := 5.48136778649561E-01+I*(-7.14910066523561E-01):d := -9.69597074366241E-01+I*(7.89596038636965E-02):e := -3.77907613960523E-01+I*(-6.19051465093737E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.57456595225609E-01+I*(-3.90926572980575E-02):b := -5.60067446119803E-01+I*(-3.96805539070749E-01):c := 3.87013958562326E-01+I*(-9.68097731363604E-01):d := -8.94708658548290E-01+I*(5.87139179682902E-02):e := -3.22352983945477E-01+I*(-4.40928452529693E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.57268274586989E-01+I*(3.17288261974404E-01):b := -2.49079016696553E-01+I*(-5.10970976307280E-02):c := 6.28327001320144E-01+I*(-1.22245223883735E+00):d := -8.12302200154725E-01+I*(-2.15248209937564E-01):e := -4.95784512208773E-01+I*(-2.38127457082190E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.59110835658836E-01+I*(5.91862579188648E-01):b := -2.67487388984119E-01+I*(3.01825636939474E-01):c := 8.49689492532970E-01+I*(-1.42509281785367E+00):d := -7.79359854784729E-01+I*(-1.45013143890599E-01):e := -4.72797758528143E-01+I*(-1.14237763818705E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.60633794597470E-01+I*(8.67661845509533E-01):b := -5.08443381240291E-01+I*(5.60347462986386E-01):c := 1.14951785225292E+00+I*(-1.43803544075858E+00):d := -7.99270784391241E-01+I*(-7.00350303953788E-02):e := -4.81155094268521E-01+I*(-4.31995538815776E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07915653365910E-01+I*(1.01563651905810E+00):b := -8.59201006760846E-01+I*(6.03503144952603E-01):c := 1.38751905874600E+00+I*(-1.25522411045365E+00):d := -8.62718443726043E-01+I*(-2.53969620452283E-02):e := -5.20087864964849E-01+I*(1.09676594427363E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.19206038895685E-01+I*(9.66547605525668E-01):b := -1.15563687432793E+00+I*(4.11099659624147E-01):c := 1.45232970240531E+00+I*(-9.62198280110176E-01):d := -9.40014967844191E-01+I*(-3.19855871180537E-02):e := -6.20359753930902E-01+I*(2.42963418739164E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.95953884473698E-02+I*(7.43364353116560E-01):b := -1.25904534698921E+00+I*(7.31647361127591E-02):c := 1.31362416277259E+00+I*(-6.96067992365218E-01):d := -9.94992454055628E-01+I*(-8.67180147178681E-02):e := -9.00680373916690E-01+I*(3.62215927702536E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.78046326533811E-02+I*(4.50516686038560E-01):b := -1.12104045112932E+00+I*(-2.52178119142257E-01):c := 1.03630430338235E+00+I*(-5.81358566563337E-01):d := -1.00192632555532E+00+I*(-1.63984333687542E-01):e := -1.38346304878386E+00+I*(-4.70950929316004E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.14671686051760E-01+I*(2.25031282356752E-01):b := -8.06196211274670E-01+I*(-4.12697368384005E-01):c := 7.50131168510218E-01+I*(-6.71743817890494E-01):d := -9.57572146807172E-01+I*(-2.27630774661682E-01):e := -9.07927088959243E-01+I*(-5.49917882626771E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02759377561439E-01+I*(1.72415268444973E-01):b := -4.61831746357215E-01+I*(-3.33284270919530E-01):c := 5.89008348422982E-01+I*(-9.24931482730537E-01):d := -8.82683730989221E-01+I*(-2.47876460557088E-01):e := -5.87800492042872E-01+I*(-3.97211815075372E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.02808656611264E-01+I*(3.79875278397965E-01):b := -2.14656788896699E-01+I*(6.07077074926621E-02):c := 7.55316951436124E-01+I*(-1.05954548291308E+00):d := -6.06018074653972E-01+I*(-4.42380591278326E-01):e := -7.71668799386868E-01+I*(-1.24249794463134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.04651217683110E-01+I*(6.54449595612208E-01):b := -2.33065161184265E-01+I*(4.13630442062864E-01):c := 9.76679442648950E-01+I*(-1.26218606192939E+00):d := -5.73075729283976E-01+I*(-3.72145525231361E-01):e := -6.13908872162970E-01+I*(3.81899913743965E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.06174176621746E-01+I*(9.30248861933094E-01):b := -4.74021153440437E-01+I*(6.72152268109777E-01):c := 1.27650780236890E+00+I*(-1.27512868483431E+00):d := -5.92986658890489E-01+I*(-2.97167411736141E-01):e := -5.29101410495491E-01+I*(1.75644161601036E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.53456035390184E-01+I*(1.07822353548166E+00):b := -8.24778778960992E-01+I*(7.15307950075992E-01):c := 1.51450900886198E+00+I*(-1.09231735452938E+00):d := -6.56434318225291E-01+I*(-2.52529343385991E-01):e := -4.73940191033871E-01+I*(3.14427450872326E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.52535790800402E-02+I*(1.02913462194923E+00):b := -1.12121464652808E+00+I*(5.22904464747537E-01):c := 1.57931965252129E+00+I*(-7.99291524185900E-01):d := -7.33730842343438E-01+I*(-2.59117968458816E-01):e := -4.39749137867642E-01+I*(4.86806166337975E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.24864229528355E-01+I*(8.05951369540120E-01):b := -1.22462311918936E+00+I*(1.84969541236150E-01):c := 1.44061411288857E+00+I*(-5.33161236440944E-01):d := -7.88708328554876E-01+I*(-3.13850396058630E-01):e := -4.55342223242993E-01+I*(7.60151820761222E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.26654985322344E-01+I*(5.13103702462120E-01):b := -1.08661822332947E+00+I*(-1.40373314018867E-01):c := 1.16329425349833E+00+I*(-4.18451810639062E-01):d := -7.95642200054571E-01+I*(-3.91116715028304E-01):e := -8.00328864376646E-01+I*(1.29272643666064E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.97879319239655E-02+I*(2.87618298780312E-01):b := -7.71773983474815E-01+I*(-3.00892563260615E-01):c := 8.77121118626197E-01+I*(-5.08837061966219E-01):d := -7.51288021306420E-01+I*(-4.54763156002444E-01):e := -2.21563497469253E+00+I*(4.93259979395351E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.48299759585714E-01+I*(2.35002284868533E-01):b := -4.27409518557361E-01+I*(-2.21479465796140E-01):c := 7.15998298538962E-01+I*(-7.62024726806262E-01):d := -6.76399605488469E-01+I*(-4.75008841897850E-01):e := -1.18283084453379E+00+I*(-3.06761572585084E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.67651121578469E-01+I*(2.64256224940262E-01):b := -2.60154576007578E-01+I*(1.68481338698990E-01):c := 7.47882452812073E-01+I*(-8.53124101301481E-01):d := -3.01997386126023E-01+I*(-4.83777209909891E-01):e := -1.66656339940274E+00+I*(6.34839461048149E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.69493682650315E-01+I*(5.38830542154505E-01):b := -2.78562948295144E-01+I*(5.21404073269192E-01):c := 9.69244944024899E-01+I*(-1.05576468031780E+00):d := -2.69055040756027E-01+I*(-4.13542143862926E-01):e := -9.45637624663570E-01+I*(3.02177370981324E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.71016641588951E-01+I*(8.14629808475391E-01):b := -5.19518940551316E-01+I*(7.79925899316104E-01):c := 1.26907330374485E+00+I*(-1.06870730322271E+00):d := -2.88965970362540E-01+I*(-3.38564030367705E-01):e := -6.20745878653743E-01+I*(4.60394164011479E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.82985003573906E-02+I*(9.62604482023960E-01):b := -8.70276566071870E-01+I*(8.23081581282320E-01):c := 1.50707451023793E+00+I*(-8.85895972917783E-01):d := -3.52413629697341E-01+I*(-2.93925962017555E-01):e := -3.95049952561793E-01+I*(5.80102776641955E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.70411114112835E-01+I*(9.13515568491525E-01):b := -1.16671243363896E+00+I*(6.30678095953865E-01):c := 1.57188515389724E+00+I*(-5.92870142574306E-01):d := -4.29710153815489E-01+I*(-3.00514587090380E-01):e := -1.87234688034388E-01+I*(6.97798083140320E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.60021764561150E-01+I*(6.90332316082417E-01):b := -1.27012090630024E+00+I*(2.92743172442477E-01):c := 1.43317961426452E+00+I*(-3.26739854829349E-01):d := -4.84687640026926E-01+I*(-3.55247014690194E-01):e := 6.00731249164479E-02+I*(8.47669261633960E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.61812520355138E-01+I*(3.97484649004418E-01):b := -1.13211601044034E+00+I*(-3.25996828125390E-02):c := 1.15585975487428E+00+I*(-2.12030429027468E-01):d := -4.91621511526622E-01+I*(-4.32513333659868E-01):e := 4.62307846156556E-01+I*(1.11584002939824E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.74945466956760E-01+I*(1.71999245322609E-01):b := -8.17271770585694E-01+I*(-1.93118932054287E-01):c := 8.69686620002146E-01+I*(-3.02415680354625E-01):d := -4.47267332778470E-01+I*(-4.96159774634008E-01):e := 1.60557052227463E+00+I*(2.07612412156810E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.31422245529192E-02+I*(1.19383231410831E-01):b := -4.72907305668240E-01+I*(-1.13705834589812E-01):c := 7.08563799914911E-01+I*(-5.55603345194667E-01):d := -3.72378916960520E-01+I*(-5.16405460529414E-01):e := -7.74992820211696E+00+I*(1.38134711518362E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.61828493615337E-01+I*(2.45305416768048E-02):b := -3.64283457788431E-01+I*(2.21795316176322E-01):c := 6.09502189979434E-01+I*(-6.99774952576749E-01):d := -4.24947935466933E-02+I*(-3.20068127902380E-01):e := 5.53161412621156E-01+I*(-3.67031738481486E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.63671054687183E-01+I*(2.99104858891048E-01):b := -3.82691830075997E-01+I*(5.74718050746524E-01):c := 8.30864681192259E-01+I*(-9.02415531593068E-01):d := -9.55244817669703E-03+I*(-2.49833061855415E-01):e := -3.08799686941915E+00+I*(3.66692850233717E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.65194013625819E-01+I*(5.74904125211934E-01):b := -6.23647822332169E-01+I*(8.33239876793437E-01):c := 1.13069304091221E+00+I*(-9.15358154497982E-01):d := -2.94633777832102E-02+I*(-1.74854948360194E-01):e := -9.70094128273438E-01+I*(1.22051395001970E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.75241276057419E-02+I*(7.22878798760502E-01):b := -9.74405447852724E-01+I*(8.76395558759652E-01):c := 1.36869424740529E+00+I*(-7.32546824193050E-01):d := -9.29110371180115E-02+I*(-1.30216880010044E-01):e := -1.89828810060814E-01+I*(1.06633735197069E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.76233742075966E-01+I*(6.73789885228068E-01):b := -1.27084131541981E+00+I*(6.83992073431198E-01):c := 1.43350489106459E+00+I*(-4.39520993849574E-01):d := -1.70207561236160E-01+I*(-1.36805505082869E-01):e := 2.30689792117679E-01+I*(8.75414254750731E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.65844392524282E-01+I*(4.50606632818960E-01):b := -1.37424978808109E+00+I*(3.46057149919809E-01):c := 1.29479935143188E+00+I*(-1.73390706104617E-01):d := -2.25185047447597E-01+I*(-1.91537932682684E-01):e := 5.38820043719119E-01+I*(6.74205209386926E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.67635148318271E-01+I*(1.57758965740960E-01):b := -1.23624489222120E+00+I*(2.07142946647925E-02):c := 1.01747949204164E+00+I*(-5.86812803027356E-02):d := -2.32118918947292E-01+I*(-2.68804251652358E-01):e := 8.23495692587278E-01+I*(4.26939838152798E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.80768094919892E-01+I*(-6.77264379408480E-02):b := -9.21400652366547E-01+I*(-1.39804954576955E-01):c := 7.31306357169507E-01+I*(-1.49066531629892E-01):d := -1.87764740199141E-01+I*(-3.32450692626498E-01):e := 1.14351548970938E+00+I*(4.28387556303955E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.26804034102128E-02+I*(-1.20342451852626E-01):b := -5.77036187449093E-01+I*(-6.03918571124796E-02):c := 5.70183537082271E-01+I*(-4.02254196469935E-01):d := -1.12876324381190E-01+I*(-3.52696378521904E-01):e := 1.53340162570427E+00+I*(-8.05362671198941E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.34856356433323E-01+I*(-2.27131459939236E-01):b := -4.78320373190383E-01+I*(1.95703437344156E-01):c := 4.04925825842911E-01+I*(-6.71251807713129E-01):d := 5.10655559660848E-02+I*(-2.78546441508906E-02):e := 3.93652987751430E-01+I*(-9.72164038015126E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.36698917505169E-01+I*(4.74428572750067E-02):b := -4.96728745477948E-01+I*(5.48626171914358E-01):c := 6.26288317055736E-01+I*(-8.73892386729449E-01):d := 8.40079013360811E-02+I*(4.23804218960745E-02):e := -4.87628307889225E-03+I*(-1.72588569376409E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.38221876443805E-01+I*(3.23242123595893E-01):b := -7.37684737734121E-01+I*(8.07147997961270E-01):c := 9.26116676775691E-01+I*(-8.86835009634363E-01):d := 6.40969717295681E-02+I*(1.17358535391295E-01):e := -4.09054439675043E+00+I*(-5.78962672367302E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.44962647877559E-02+I*(4.71216797144461E-01):b := -1.08844236325467E+00+I*(8.50303679927486E-01):c := 1.16411788326876E+00+I*(-7.04023679329431E-01):d := 6.49312394766826E-04+I*(1.61996603741445E-01):e := 1.42535711765512E+00+I*(2.66691186876951E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.03205879257980E-01+I*(4.22127883612026E-01):b := -1.38487823082176E+00+I*(6.57900194599032E-01):c := 1.22892852692807E+00+I*(-4.10997848985955E-01):d := -7.66472117233811E-02+I*(1.55407978668620E-01):e := 1.06568788397027E+00+I*(8.01817027363839E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.92816529706296E-01+I*(1.98944631202919E-01):b := -1.48828670348304E+00+I*(3.19965271087644E-01):c := 1.09022298729535E+00+I*(-1.44867561240998E-01):d := -1.31624697934818E-01+I*(1.00675551068806E-01):e := 8.92365409811432E-01+I*(2.46686417005994E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.94607285500285E-01+I*(-9.39030358750809E-02):b := -1.35028180762315E+00+I*(-5.37758416737351E-03):c := 8.12903127905117E-01+I*(-3.01581354391164E-02):d := -1.38558569434514E-01+I*(2.34092320991319E-02):e := 7.77431433398196E-01+I*(-7.38720739073173E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.07740232101906E-01+I*(-3.19388439556889E-01):b := -1.03543756776850E+00+I*(-1.65896833409121E-01):c := 5.26729993032984E-01+I*(-1.20543386766273E-01):d := -9.42043906863623E-02+I*(-4.02372088750081E-02):e := 6.76619135086487E-01+I*(-3.32134357568330E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.96525405922270E-02+I*(-3.72004453468668E-01):b := -6.91073102851045E-01+I*(-8.64837359446458E-02):c := 3.65607172945748E-01+I*(-3.73731051606316E-01):d := -1.93159748684120E-02+I*(-6.04828947704143E-02):e := 5.63224881187049E-01+I*(-6.01922980394105E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.52564161405601E-01+I*(-3.72974332440115E-01):b := -5.48906182117718E-01+I*(1.02414382286995E-01):c := 2.29876914795013E-01+I*(-7.80900963191755E-01):d := -6.50942649321785E-02+I*(2.56133304706132E-01):e := 8.24864176180675E-02+I*(-6.29877070483603E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.54406722477447E-01+I*(-9.84000152258715E-02):b := -5.67314554405284E-01+I*(4.55337116857196E-01):c := 4.51239406007839E-01+I*(-9.83541542208074E-01):d := -3.21519195621822E-02+I*(3.26368370753097E-01):e := -9.67500730714999E-02+I*(-7.83908709697080E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.55929681416083E-01+I*(1.77399251095014E-01):b := -8.08270546661457E-01+I*(7.13858942904109E-01):c := 7.51067765727794E-01+I*(-9.96484165112988E-01):d := -5.20628491686954E-02+I*(4.01346484248318E-01):e := -3.43877688016162E-01+I*(-1.16018862195560E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.03211540184522E-01+I*(3.25373924643583E-01):b := -1.15902817218201E+00+I*(7.57014624870325E-01):c := 9.89068972220867E-01+I*(-8.13672834808057E-01):d := -1.15510508503496E-01+I*(4.45984552598468E-01):e := 1.63902499623820E-02+I*(-2.59422814485524E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.54980742857022E-02+I*(2.76285011111148E-01):b := -1.45546403974910E+00+I*(5.64611139541871E-01):c := 1.05387961588017E+00+I*(-5.20647004464581E-01):d := -1.92807032621644E-01+I*(4.39395927525643E-01):e := 1.78373646840413E+00+I*(-9.05605961807563E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.75108724734018E-01+I*(5.31017587020407E-02):b := -1.55887251241038E+00+I*(2.26676216030482E-01):c := 9.15174076247456E-01+I*(-2.54516716719623E-01):d := -2.47784518833082E-01+I*(3.84663499925829E-01):e := 9.44842878207393E-01+I*(-4.14419008753331E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.76899480528006E-01+I*(-2.39745908375959E-01):b := -1.42086761655048E+00+I*(-9.86666392245347E-02):c := 6.37854216857220E-01+I*(-1.39807290917742E-01):d := -2.54718390332777E-01+I*(3.07397180956155E-01):e := 5.91864488111054E-01+I*(-4.21328744318802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.00324271296278E-02+I*(-4.65231312057767E-01):b := -1.10602337669583E+00+I*(-2.59185888466282E-01):c := 3.51681081985086E-01+I*(-2.30192542244899E-01):d := -2.10364211584626E-01+I*(2.43750739982015E-01):e := 3.88818168028645E-01+I*(-4.72839034803962E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.98055264380051E-01+I*(-5.17847325969546E-01):b := -7.61658911778380E-01+I*(-1.79772791001807E-01):c := 1.90558261897851E-01+I*(-4.83380207084942E-01):d := -1.35475795766676E-01+I*(2.23505054086608E-01):e := 2.32990906072725E-01+I*(-5.39150838440211E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.13084007032903E-01+I*(-3.44756574919688E-01):b := -5.43013000099453E-01+I*(-1.44208633415568E-02):c := 1.66262787766997E-01+I*(-9.77416360549554E-01):d := -3.36621785070577E-01+I*(3.99014601223999E-01):e := -8.61181457616678E-02+I*(-4.89673133813745E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.14926568104750E-01+I*(-7.01822577054443E-02):b := -5.61421372387019E-01+I*(3.38501871228645E-01):c := 3.87625278979823E-01+I*(-1.18005693956587E+00):d := -3.03679439700581E-01+I*(4.69249667270964E-01):e := -2.13726106692246E-01+I*(-5.06214450688722E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.16449527043385E-01+I*(2.05617008615441E-01):b := -8.02377364643191E-01+I*(5.97023697275557E-01):c := 6.87453638699778E-01+I*(-1.19299956247079E+00):d := -3.23590369307094E-01+I*(5.44227780766185E-01):e := -3.76811257276221E-01+I*(-5.80024005179850E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.63731385811824E-01+I*(3.53591682164010E-01):b := -1.15313499016375E+00+I*(6.40179379241773E-01):c := 9.25454845192851E-01+I*(-1.01018823216586E+00):d := -3.87038028641896E-01+I*(5.88865849116335E-01):e := -5.78249261353190E-01+I*(-8.46361176596972E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.75021771341600E-01+I*(3.04502768631575E-01):b := -1.44957085773083E+00+I*(4.47775893913319E-01):c := 9.90265488852159E-01+I*(-7.17162401822379E-01):d := -4.64334552760043E-01+I*(5.82277224043510E-01):e := -2.49397653639412E-01+I*(-1.50581105852017E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.45888791067158E-02+I*(8.13195162224677E-02):b := -1.55297933039211E+00+I*(1.09840970401931E-01):c := 8.51559949219440E-01+I*(-4.51032114077423E-01):d := -5.19312038971481E-01+I*(5.27544796443696E-01):e := 4.36426947545931E-01+I*(-1.05496016825781E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.63796349007042E-02+I*(-2.11528150855532E-01):b := -1.41497443453222E+00+I*(-2.15501884853086E-01):c := 5.74240089829203E-01+I*(-3.36322688275542E-01):d := -5.26245910471176E-01+I*(4.50278477474022E-01):e := 3.14547672105309E-01+I*(-6.74019955696045E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.70487418497674E-01+I*(-4.37013554537341E-01):b := -1.10013019467757E+00+I*(-3.76021134094834E-01):c := 2.88066954957070E-01+I*(-4.26707939602698E-01):d := -4.81891731723025E-01+I*(3.86632036499882E-01):e := 1.58236555341900E-01+I*(-5.48996244951249E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.58575110007353E-01+I*(-4.89629568449119E-01):b := -7.55765729760115E-01+I*(-2.96608036630358E-01):c := 1.26944134869835E-01+I*(-6.79895604442741E-01):d := -4.07003315905074E-01+I*(3.66386350604476E-01):e := 3.10640510017343E-02+I*(-5.02374454786548E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.16472969755006E-01+I*(-1.03183768583238E-01):b := -3.85543497494455E-01+I*(-3.49288735982174E-01):c := 5.36498809274781E-01+I*(-8.07778391647854E-01):d := -7.52709650770763E-01+I*(1.34745366348920E-01):e := -3.45284917351435E-01+I*(-2.69851146387294E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01831553082685E+00+I*(1.71390548631005E-01):b := -4.03951869782020E-01+I*(3.63399858802777E-03):c := 7.57861300487606E-01+I*(-1.01041897066417E+00):d := -7.19767305400766E-01+I*(2.04980432395885E-01):e := -3.67759960231433E-01+I*(-1.87650647944411E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.19838489765488E-01+I*(4.47189814951891E-01):b := -6.44907862038193E-01+I*(2.62155824634941E-01):c := 1.05768966020756E+00+I*(-1.02336159356909E+00):d := -7.39678235007279E-01+I*(2.79958545891106E-01):e := -4.13498154282140E-01+I*(-1.17670237709219E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.67120348533928E-01+I*(5.95164488500459E-01):b := -9.95665487558747E-01+I*(3.05311506601157E-01):c := 1.29569086670063E+00+I*(-8.40550263264156E-01):d := -8.03125894342081E-01+I*(3.24596614241256E-01):e := -4.93500492527103E-01+I*(-5.67011066360911E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78410734063702E-01+I*(5.46075574968025E-01):b := -1.29210135512583E+00+I*(1.12908021272702E-01):c := 1.36050151035994E+00+I*(-5.47524432920679E-01):d := -8.80422418460229E-01+I*(3.18007989168431E-01):e := -6.41087477962048E-01+I*(-2.90866728064697E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.88800083615387E-01+I*(3.22892322558917E-01):b := -1.39550982778711E+00+I*(-2.25026902238686E-01):c := 1.22179597072722E+00+I*(-2.81394145175722E-01):d := -9.35399904671666E-01+I*(2.63275561568617E-01):e := -8.59306721243575E-01+I*(-1.80106672084037E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87009327821398E-01+I*(3.00446554809171E-02):b := -1.25750493192722E+00+I*(-5.50369757493703E-01):c := 9.44476111336987E-01+I*(-1.66684719373841E-01):d := -9.42333776171361E-01+I*(1.86009242598943E-01):e := -7.40913081651810E-01+I*(-5.40370945049180E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.73876381219777E-01+I*(-1.95440748200891E-01):b := -9.42660692072571E-01+I*(-7.10889006735451E-01):c := 6.58302976464854E-01+I*(-2.57069970700998E-01):d := -8.97979597423210E-01+I*(1.22362801624803E-01):e := -4.47874263333757E-01+I*(-5.13418278713638E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.61964072729456E-01+I*(-2.48056762112670E-01):b := -5.98296227155117E-01+I*(-6.31475909270976E-01):c := 4.97180156377618E-01+I*(-5.10257635541041E-01):d := -8.23091181605260E-01+I*(1.02117115729397E-01):e := -3.54696789212006E-01+I*(-3.76147746107702E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.33922699815522E-01+I*(1.58278157375341E-01):b := -2.69459901456240E-01+I*(-3.63773312131340E-01):c := 7.18982218946728E-01+I*(-9.04550617780822E-01):d := -9.40570518400448E-01+I*(-1.07845963876537E-01):e := -3.72376052808509E-01+I*(-1.50672749907519E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.03576526088737E+00+I*(4.32852474589585E-01):b := -2.87868273743806E-01+I*(-1.08505775611383E-02):c := 9.40344710159554E-01+I*(-1.10719119679714E+00):d := -9.07628173030452E-01+I*(-3.76108978295717E-02):e := -3.55156555914806E-01+I*(-8.38122606223014E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.37288219826004E-01+I*(7.08651740910471E-01):b := -5.28824265999979E-01+I*(2.47671248485774E-01):c := 1.24017306987951E+00+I*(-1.12013381970206E+00):d := -9.27539102636965E-01+I*(3.73672156656483E-02):e := -3.62735795759958E-01+I*(-2.18165235263041E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.84570078594443E-01+I*(8.56626414459039E-01):b := -8.79581891520533E-01+I*(2.90826930451990E-01):c := 1.47817427637258E+00+I*(-9.37322489397124E-01):d := -9.90986761971766E-01+I*(8.20052840157986E-02):e := -3.94807087754470E-01+I*(3.80168305985676E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.95860464124218E-01+I*(8.07537500926604E-01):b := -1.17601775908762E+00+I*(9.84234451235353E-02):c := 1.54298492003189E+00+I*(-6.44296659053647E-01):d := -1.06828328608991E+00+I*(7.54166589429736E-02):e := -4.66403344915471E-01+I*(9.04706034991662E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.06249813675903E-01+I*(5.84354248517497E-01):b := -1.27942623174890E+00+I*(-2.39511478387853E-01):c := 1.40427938039917E+00+I*(-3.78166371308691E-01):d := -1.12326077230135E+00+I*(2.06842313431593E-02):e := -6.02685395978010E-01+I*(8.82242141333334E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.04459057881915E-01+I*(2.91506581439497E-01):b := -1.14142133588901E+00+I*(-5.64854333642869E-01):c := 1.12695952100894E+00+I*(-2.63456945506809E-01):d := -1.13019464380105E+00+I*(-5.65820876265145E-02):e := -7.08329982081267E-01+I*(-8.71609563620748E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.91326111280293E-01+I*(6.60211777576886E-02):b := -8.26577096034357E-01+I*(-7.25373582884617E-01):c := 8.40786386136802E-01+I*(-3.53842196833966E-01):d := -1.08584046505290E+00+I*(-1.20228528600655E-01):e := -5.72196114489414E-01+I*(-2.46264022803247E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.79413802789972E-01+I*(1.34051638459101E-02):b := -4.82212631116902E-01+I*(-6.45960485420142E-01):c := 6.79663566049566E-01+I*(-6.07029861674009E-01):d := -1.01095204923494E+00+I*(-1.40474214496061E-01):e := -4.32256478682807E-01+I*(-2.20237981839490E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.79225482151352E-01+I*(3.69786083118373E-01):b := -1.71224201693653E-01+I*(-3.00252043980121E-01):c := 9.20976608807385E-01+I*(-8.61384369147755E-01):d := -9.28545590841379E-01+I*(-4.14436342401916E-01):e := -4.13206122565237E-01+I*(-4.22645093506669E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.81068043223198E-01+I*(6.44360400332615E-01):b := -1.89632573981218E-01+I*(5.26706905900809E-02):c := 1.14233910002021E+00+I*(-1.06402494816407E+00):d := -8.95603245471382E-01+I*(-3.44201276354950E-01):e := -3.62870594514124E-01+I*(7.81847234550633E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.82591002161834E-01+I*(9.20159666653501E-01):b := -4.30588566237391E-01+I*(3.11192516636994E-01):c := 1.44216745974016E+00+I*(-1.07696757106899E+00):d := -9.15514175077895E-01+I*(-2.69223162859730E-01):e := -3.41180888422743E-01+I*(6.30225441184528E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.29872860930273E-01+I*(1.06813434020207E+00):b := -7.81346191757945E-01+I*(3.54348198603209E-01):c := 1.68016866623324E+00+I*(-8.94156240764057E-01):d := -9.78961834412696E-01+I*(-2.24585094509579E-01):e := -3.41257087872289E-01+I*(1.22259797472005E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.41163246460048E-01+I*(1.01904542666963E+00):b := -1.07778205932503E+00+I*(1.61944713274755E-01):c := 1.74497930989255E+00+I*(-6.01130410420580E-01):d := -1.05625835853084E+00+I*(-2.31173719582404E-01):e := -3.69694988991098E-01+I*(1.87029726922982E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.15525960117330E-02+I*(7.95862174260527E-01):b := -1.18119053198631E+00+I*(-1.75990210236634E-01):c := 1.60627377025983E+00+I*(-3.35000122675623E-01):d := -1.11123584474228E+00+I*(-2.85906147182219E-01):e := -4.51806972362362E-01+I*(2.44546415993387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.97618402177438E-02+I*(5.03014507182528E-01):b := -1.04318563612642E+00+I*(-5.01333065491650E-01):c := 1.32895391086959E+00+I*(-2.20290696873741E-01):d := -1.11816971624198E+00+I*(-3.63172466151893E-01):e := -6.02634361713399E-01+I*(2.11039709622106E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.36628893616123E-01+I*(2.77529103500719E-01):b := -7.28341396271769E-01+I*(-6.61852314733398E-01):c := 1.04278077599746E+00+I*(-3.10675948200898E-01):d := -1.07381553749383E+00+I*(-4.26818907126033E-01):e := -6.39468278561760E-01+I*(2.21672706445165E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.24716585125802E-01+I*(2.24913089588941E-01):b := -3.83976931354315E-01+I*(-5.82439217268923E-01):c := 8.81657955910222E-01+I*(-5.63863613040941E-01):d := -9.98927121675875E-01+I*(-4.47064593021439E-01):e := -5.11309201718889E-01+I*(-6.56476753075917E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.24765864175627E-01+I*(4.32373099541932E-01):b := -1.36801973893798E-01+I*(-1.88447238856730E-01):c := 1.04796655892336E+00+I*(-6.98477613223480E-01):d := -7.22261465340627E-01+I*(-6.41568723742676E-01):e := -4.81667728435617E-01+I*(8.08207538470182E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.26608425247473E-01+I*(7.06947416756175E-01):b := -1.55210346181364E-01+I*(1.64475495713471E-01):c := 1.26932905013619E+00+I*(-9.01118192239799E-01):d := -6.89319119970630E-01+I*(-5.71333657695712E-01):e := -3.91751602114013E-01+I*(1.05918261920295E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.28131384186109E-01+I*(9.82746683077061E-01):b := -3.96166338437536E-01+I*(4.22997321760384E-01):c := 1.56915740985614E+00+I*(-9.14060815144714E-01):d := -7.09230049577144E-01+I*(-4.96355544200491E-01):e := -3.38149432254687E-01+I*(1.52306294629259E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.75413242954548E-01+I*(1.13072135662563E+00):b := -7.46923963958091E-01+I*(4.66153003726599E-01):c := 1.80715861634922E+00+I*(-7.31249484839781E-01):d := -7.72677708911944E-01+I*(-4.51717475850341E-01):e := -3.07364566661982E-01+I*(2.09529320121042E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.32963715156766E-02+I*(1.08163244309319E+00):b := -1.04335983152518E+00+I*(2.73749518398145E-01):c := 1.87196926000853E+00+I*(-4.38223654496305E-01):d := -8.49974233030093E-01+I*(-4.58306100923166E-01):e := -2.98250746078487E-01+I*(2.80708235247170E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.02907021963992E-01+I*(8.58449190684087E-01):b := -1.14676830418646E+00+I*(-6.41854051132436E-02):c := 1.73326372037581E+00+I*(-1.72093366751348E-01):d := -9.04951719241530E-01+I*(-5.13038528522980E-01):e := -3.28577067927034E-01+I*(3.71440710097911E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.04697777757981E-01+I*(5.65601523606088E-01):b := -1.00876340832656E+00+I*(-3.89528260368260E-01):c := 1.45594386098557E+00+I*(-5.73839409494666E-02):d := -9.11885590741225E-01+I*(-5.90304847492654E-01):e := -4.53958118287334E-01+I*(4.53582074779336E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.78307243596019E-02+I*(3.40116119924279E-01):b := -6.93919168471914E-01+I*(-5.50047509610007E-01):c := 1.16977072611344E+00+I*(-1.47769192276624E-01):d := -8.67531411993074E-01+I*(-6.53951288466795E-01):e := -6.53916257029980E-01+I*(3.51692419869815E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.70256967150078E-01+I*(2.87500106012500E-01):b := -3.49554703554460E-01+I*(-4.70634412145532E-01):c := 1.00864790602620E+00+I*(-4.00956857116667E-01):d := -7.92642996175124E-01+I*(-6.74196974362200E-01):e := -6.16704436576102E-01+I*(1.34139284431380E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.89608329142833E-01+I*(3.16754046084230E-01):b := -1.82299761004677E-01+I*(-8.06736076504031E-02):c := 1.04053206029931E+00+I*(-4.92056231611886E-01):d := -4.18240776812677E-01+I*(-6.82965342374241E-01):e := -6.35016266684933E-01+I*(2.54956937831442E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.91450890214679E-01+I*(5.91328363298473E-01):b := -2.00708133292243E-01+I*(2.72249126919799E-01):c := 1.26189455151214E+00+I*(-6.94696810628205E-01):d := -3.85298431442681E-01+I*(-6.12730276327276E-01):e := -4.68255166903656E-01+I*(2.31670718819303E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.92973849153314E-01+I*(8.67127629619359E-01):b := -4.41664125548415E-01+I*(5.30770952966711E-01):c := 1.56172291123209E+00+I*(-7.07639433533119E-01):d := -4.05209361049194E-01+I*(-5.37752162832056E-01):e := -3.62893332677289E-01+I*(2.65391663757101E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.02557079217544E-02+I*(1.01510230316793E+00):b := -7.92421751068969E-01+I*(5.73926634932927E-01):c := 1.79972411772517E+00+I*(-5.24828103228188E-01):d := -4.68657020383996E-01+I*(-4.93114094481905E-01):e := -2.89305812519117E-01+I*(3.19340720594754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.48453906548471E-01+I*(9.66013389635492E-01):b := -1.08885761863605E+00+I*(3.81523149604472E-01):c := 1.86453476138447E+00+I*(-2.31802272884711E-01):d := -5.45953544502143E-01+I*(-4.99702719554731E-01):e := -2.33539023345200E-01+I*(3.93629876789634E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.38064556996786E-01+I*(7.42830137226385E-01):b := -1.19226609129734E+00+I*(4.35882260930846E-02):c := 1.72582922175175E+00+I*(3.43280148602455E-02):d := -6.00931030713581E-01+I*(-5.54435147154545E-01):e := -1.98065290328365E-01+I*(5.05074032259768E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.39855312790775E-01+I*(4.49982470148385E-01):b := -1.05426119543744E+00+I*(-2.81754629161933E-01):c := 1.44850936236152E+00+I*(1.49037440662127E-01):d := -6.07864902213276E-01+I*(-6.31701466124219E-01):e := -2.30997236639816E-01+I*(6.87435014037018E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.52988259392396E-01+I*(2.24497066466577E-01):b := -7.39416955582793E-01+I*(-4.42273878403680E-01):c := 1.16233622748939E+00+I*(5.86521893349704E-02):d := -5.63510723465125E-01+I*(-6.95347907098359E-01):e := -5.30867172322436E-01+I*(8.56248428258472E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.50994321172829E-02+I*(1.71881052554798E-01):b := -3.95052490665339E-01+I*(-3.62860780939205E-01):c := 1.00121340740215E+00+I*(-1.94535475505072E-01):d := -4.88622307647174E-01+I*(-7.15593592993765E-01):e := -8.21310027055099E-01+I*(5.03308983158417E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.83785701179701E-01+I*(7.70283628207724E-02):b := -2.86428642785530E-01+I*(-2.73596301730707E-02):c := 9.02151797466673E-01+I*(-3.38707082887153E-01):d := -1.58738184233348E-01+I*(-5.19256260366731E-01):e := -1.21622884776446E+00+I*(4.68503595049462E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.85628262251547E-01+I*(3.51602680035015E-01):b := -3.04837015073096E-01+I*(3.25563104397131E-01):c := 1.12351428867950E+00+I*(-5.41347661903473E-01):d := -1.25795838863351E-01+I*(-4.49021194319766E-01):e := -7.20260152109863E-01+I*(3.88524634515491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87151221190182E-01+I*(6.27401946355901E-01):b := -5.45793007329268E-01+I*(5.84084930444044E-01):c := 1.42334264839945E+00+I*(-5.54290284808387E-01):d := -1.45706768469864E-01+I*(-3.74043080824545E-01):e := -4.76351798339218E-01+I*(4.30623938671013E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.55669200413780E-02+I*(7.75376619904470E-01):b := -8.96550632849823E-01+I*(6.27240612410260E-01):c := 1.66134385489253E+00+I*(-3.71478954503456E-01):d := -2.09154427804666E-01+I*(-3.29405012474395E-01):e := -3.11318074247763E-01+I*(4.92168369843491E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.54276534511603E-01+I*(7.26287706372035E-01):b := -1.19298650041691E+00+I*(4.34837127081805E-01):c := 1.72615449855183E+00+I*(-7.84531241599786E-02):d := -2.86450951922813E-01+I*(-3.35993637547220E-01):e := -1.68403545755578E-01+I*(5.71347995883629E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.43887184959918E-01+I*(5.03104453962927E-01):b := -1.29639497307819E+00+I*(9.69022035704172E-02):c := 1.58744895891911E+00+I*(1.87677163584978E-01):d := -3.41428438134251E-01+I*(-3.90726065147034E-01):e := -1.56301713031303E-02+I*(6.90576363816287E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.45677940753908E-01+I*(2.10256786884928E-01):b := -1.15839007721830E+00+I*(-2.28440651684600E-01):c := 1.31012909952888E+00+I*(3.02386589386860E-01):d := -3.48362309633946E-01+I*(-4.67992384116708E-01):e := 1.79642254110902E-01+I*(9.28252001547231E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.58810887355529E-01+I*(-1.52286167968806E-02):b := -8.43545837363646E-01+I*(-3.88959900926347E-01):c := 1.02395596465675E+00+I*(2.12001338059703E-01):d := -3.04008130885795E-01+I*(-5.31638825090848E-01):e := 3.40291694805476E-01+I*(1.67003496360349E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -7.07231958458494E-02+I*(-6.78446307086590E-02):b := -4.99181372446192E-01+I*(-3.09546803461873E-01):c := 8.62833144569511E-01+I*(-4.11863267803400E-02):d := -2.29119715067844E-01+I*(-5.51884510986255E-01):e := -1.81532194012580E+00+I*(2.02848925577453E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.56813563997686E-01+I*(-1.74633638795269E-01):b := -4.00465558187482E-01+I*(-5.34515090052369E-02):c := 6.97575433330150E-01+I*(-3.10183938023534E-01):d := -6.51778347205694E-02+I*(-2.27042776615241E-01):e := -1.44687999022403E+00+I*(-1.24071582000627E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.58656125069532E-01+I*(9.99406784189742E-02):b := -4.18873930475048E-01+I*(2.99471225564965E-01):c := 9.18937924542976E-01+I*(-5.12824517039854E-01):d := -3.22354893505731E-02+I*(-1.56807710568276E-01):e := -1.31650521147023E+00+I*(-6.46355945162041E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.60179084008168E-01+I*(3.75739944739860E-01):b := -6.59829922731220E-01+I*(5.57993051611878E-01):c := 1.21876628426293E+00+I*(-5.25767139944768E-01):d := -5.21464189570862E-02+I*(-8.18295970730555E-02):e := -9.47672326352526E-01+I*(4.83150812888124E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.46094277660764E-03+I*(5.23714618288428E-01):b := -1.01058754825177E+00+I*(6.01148733578094E-01):c := 1.45676749075600E+00+I*(-3.42955809639836E-01):d := -1.15594078291887E-01+I*(-3.71915287229054E-02):e := -5.68620556047644E-01+I*(7.89926739890407E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.81248671693617E-01+I*(4.74625704755994E-01):b := -1.30702341581886E+00+I*(4.08745248249639E-01):c := 1.52157813441531E+00+I*(-4.99299792963599E-02):d := -1.92890602410035E-01+I*(-4.37801537957305E-02):e := -1.55286866662071E-01+I*(9.82487216303627E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.70859322141932E-01+I*(2.51442452346886E-01):b := -1.41043188848014E+00+I*(7.08103247382503E-02):c := 1.38287259478259E+00+I*(2.16200308448597E-01):d := -2.47868088621473E-01+I*(-9.85125813955447E-02):e := 3.70007631375063E-01+I*(1.07780143613063E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.72650077935921E-01+I*(-4.14052147311134E-02):b := -1.27242699262025E+00+I*(-2.54532530516766E-01):c := 1.10555273539236E+00+I*(3.30909734250478E-01):d := -2.54801960121168E-01+I*(-1.75778900365219E-01):e := 1.16210469639687E+00+I*(9.43466628178530E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.85783024537543E-01+I*(-2.66890618412922E-01):b := -9.57582752765598E-01+I*(-4.15051779758514E-01):c := 8.19379600520223E-01+I*(2.40524482923322E-01):d := -2.10447781373017E-01+I*(-2.39425341339359E-01):e := 2.27801876490050E+00+I*(-2.22166220087692E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.30466697213645E-03+I*(-3.19506632324700E-01):b := -6.13218287848144E-01+I*(-3.35638682294038E-01):c := 6.58256780432988E-01+I*(-1.26631819167208E-02):d := -1.35559365555066E-01+I*(-2.59671027234765E-01):e := 5.89578865326591E-01+I*(-2.78571836926935E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.74521368969965E-01+I*(-3.20476511296147E-01):b := -4.71051367114817E-01+I*(-1.46740564062398E-01):c := 5.22526522282253E-01+I*(-4.19833093502160E-01):d := -1.81337655618833E-01+I*(5.69451722417815E-02):e := -4.11111941561282E-01+I*(-7.59033506695243E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.76363930041811E-01+I*(-4.59021940819041E-02):b := -4.89459739402383E-01+I*(2.06182170507804E-01):c := 7.43889013495078E-01+I*(-6.22473672518479E-01):d := -1.48395310248837E-01+I*(1.27180238288747E-01):e := -6.79730646816067E-01+I*(-5.32857347318381E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.77886888980447E-01+I*(2.29897072238982E-01):b := -7.30415731658556E-01+I*(4.64703996554717E-01):c := 1.04371737321503E+00+I*(-6.35416295423394E-01):d := -1.68306239855350E-01+I*(2.02158351783967E-01):e := -9.48681274539928E-01+I*(-2.39444595171212E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.25168747748886E-01+I*(3.77871745787550E-01):b := -1.08117335717911E+00+I*(5.07859678520932E-01):c := 1.28171857970811E+00+I*(-4.52604965118462E-01):d := -2.31753899190151E-01+I*(2.46796420134117E-01):e := -1.27179867315621E+00+I*(2.64503668142155E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.35408667213388E-02+I*(3.28782832255116E-01):b := -1.37760922474619E+00+I*(3.15456193192478E-01):c := 1.34652922336741E+00+I*(-1.59579134774986E-01):d := -3.09050423308299E-01+I*(2.40207795061292E-01):e := -1.58249773643522E+00+I*(1.61060669428586E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.53151517169654E-01+I*(1.05599579846008E-01):b := -1.48101769740748E+00+I*(-2.24787303189106E-02):c := 1.20782368373469E+00+I*(1.06551152969971E-01):d := -3.64027909519736E-01+I*(1.85475367461478E-01):e := 3.23361638609058E+00+I*(3.75966736613584E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.54942272963643E-01+I*(-1.87248087231991E-01):b := -1.34301280154758E+00+I*(-3.47821585573927E-01):c := 9.30503824344459E-01+I*(2.21260578771853E-01):d := -3.70961781019432E-01+I*(1.08209048491804E-01):e := 1.83584285024329E+00+I*(-1.28704174795831E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -6.80752195652644E-02+I*(-4.12733490913800E-01):b := -1.02816856169293E+00+I*(-5.08340834815675E-01):c := 6.44330689472326E-01+I*(1.30875327444696E-01):d := -3.26607602271280E-01+I*(4.45626075176641E-02):e := 4.71439888399356E-01+I*(-1.20543978994164E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.20012471944415E-01+I*(-4.65349504825578E-01):b := -6.83804096775480E-01+I*(-4.28927737351200E-01):c := 4.83207869385091E-01+I*(-1.22312337395347E-01):d := -2.51719186453330E-01+I*(2.43169216222578E-02):e := -7.70035040285823E-02+I*(-9.73634980272121E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.35041214597267E-01+I*(-2.92258753775721E-01):b := -4.65158185096552E-01+I*(-2.63575809690950E-01):c := 4.58912395254236E-01+I*(-6.16348490859960E-01):d := -4.52865175757232E-01+I*(1.99826468759649E-01):e := -3.35735790794227E-01+I*(-4.37323073094305E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.36883775669113E-01+I*(-1.76844365614777E-02):b := -4.83566557384118E-01+I*(8.93469248792522E-02):c := 6.80274886467062E-01+I*(-8.18989069876279E-01):d := -4.19922830387236E-01+I*(2.70061534806615E-01):e := -4.26809059173240E-01+I*(-3.30716236335912E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.38406734607749E-01+I*(2.58114829759408E-01):b := -7.24522549640290E-01+I*(3.47868750926165E-01):c := 9.80103246187016E-01+I*(-8.31931692781192E-01):d := -4.39833759993749E-01+I*(3.45039648301835E-01):e := -5.45050351114742E-01+I*(-2.36621181395477E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.85688593376188E-01+I*(4.06089503307976E-01):b := -1.07528017516084E+00+I*(3.91024432892380E-01):c := 1.21810445268009E+00+I*(-6.49120362476261E-01):d := -5.03281419328550E-01+I*(3.89677716651985E-01):e := -7.35542210030160E-01+I*(-1.48247316694926E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.96978978905964E-01+I*(3.57000589775542E-01):b := -1.37171604272793E+00+I*(1.98620947563926E-01):c := 1.28291509633940E+00+I*(-3.56094532132785E-01):d := -5.80577943446698E-01+I*(3.83089091579160E-01):e := -1.14188501611257E+00+I*(-1.37790240334580E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.36832845764848E-03+I*(1.33817337366434E-01):b := -1.47512451538921E+00+I*(-1.39313975947463E-01):c := 1.14420955670668E+00+I*(-8.99642443878278E-02):d := -6.35555429658135E-01+I*(3.28356663979346E-01):e := -1.69281032133516E+00+I*(-1.07357735475962E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.57757266365973E-03+I*(-1.59030329711565E-01):b := -1.33711961952932E+00+I*(-4.64656831202479E-01):c := 8.66889697316443E-01+I*(2.47451814140532E-02):d := -6.42489301157831E-01+I*(2.51090345009672E-01):e := -3.81011665867414E-01+I*(-1.37336238501511E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.92444626062038E-01+I*(-3.84515733393373E-01):b := -1.02227537967467E+00+I*(-6.25176080444227E-01):c := 5.80716562444310E-01+I*(-6.56400699131033E-02):d := -5.98135122409679E-01+I*(1.87443904035532E-01):e := -1.97757238452495E-01+I*(-8.30418040795068E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.80532317571717E-01+I*(-4.37131747305152E-01):b := -6.77910914757214E-01+I*(-5.45762982979751E-01):c := 4.19593742357074E-01+I*(-3.18827734753146E-01):d := -5.23246706591729E-01+I*(1.67198218140125E-01):e := -2.55743357473622E-01+I*(-5.81626620688171E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.99548217629215E-01+I*(-4.88542834543598E-02):b := -1.65749536685922E-01+I*(-4.90108387670431E-01):c := 5.28591461978944E-01+I*(-3.43072814810906E-01):d := -7.13721590710897E-01+I*(-9.25614069019752E-02):e := -4.64299232828108E-01+I*(-1.15302235680520E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.00139077870106E+00+I*(2.25720033759883E-01):b := -1.84157908973488E-01+I*(-1.37185653100229E-01):c := 7.49953953191769E-01+I*(-5.45713393827225E-01):d := -6.80779245340900E-01+I*(-2.23263408550098E-02):e := -4.15832240333501E-01+I*(-3.47319174508237E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.02913737639697E-01+I*(5.01519300080769E-01):b := -4.25113901229660E-01+I*(1.21336172946684E-01):c := 1.04978231291172E+00+I*(-5.58656016732139E-01):d := -7.00690174947413E-01+I*(5.26517726402107E-02):e := -4.00590372162996E-01+I*(4.29705642056389E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.50195596408136E-01+I*(6.49493973629337E-01):b := -7.75871526750215E-01+I*(1.64491854912899E-01):c := 1.28778351940480E+00+I*(-3.75844686427208E-01):d := -7.64137834282214E-01+I*(9.72898409903609E-02):e := -4.11041793068684E-01+I*(1.23755319654459E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.61485981937911E-01+I*(6.00405060096903E-01):b := -1.07230739431730E+00+I*(-2.79116304155559E-02):c := 1.35259416306411E+00+I*(-8.28188560837304E-02):d := -8.41434358400363E-01+I*(9.07012159175353E-02):e := -4.60092019370070E-01+I*(2.13849374663077E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.71875331489596E-01+I*(3.77221807687795E-01):b := -1.17571586697858E+00+I*(-3.65846553926943E-01):c := 1.21388862343139E+00+I*(1.83311431661226E-01):d := -8.96411844611800E-01+I*(3.59687883177217E-02):e := -5.96358280514109E-01+I*(2.95963953631922E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.70084575695607E-01+I*(8.43741406097961E-02):b := -1.03771097111869E+00+I*(-6.91189409181961E-01):c := 9.36568764041150E-01+I*(2.98020857463108E-01):d := -9.03345716111496E-01+I*(-4.12975306519529E-02):e := -8.53248542409480E-01+I*(1.98633517728610E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.56951629093986E-01+I*(-1.41111263072013E-01):b := -7.22866731264038E-01+I*(-8.51708658423708E-01):c := 6.50395629169017E-01+I*(2.07635606135951E-01):d := -8.58991537363344E-01+I*(-1.04943971626093E-01):e := -8.12616747984124E-01+I*(-1.39116209220302E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.45039320603665E-01+I*(-1.93727276983791E-01):b := -3.78502266346584E-01+I*(-7.72295560959233E-01):c := 4.89272809081782E-01+I*(-4.55520587040923E-02):d := -7.84103121545394E-01+I*(-1.25189657521499E-01):e := -5.80736970912248E-01+I*(-1.88591528668677E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.16997947689731E-01+I*(2.12607642504220E-01):b := -4.96659406477080E-02+I*(-5.04592963819597E-01):c := 7.11074871650892E-01+I*(-4.39845040943874E-01):d := -9.01582458340582E-01+I*(-3.35152737127432E-01):e := -3.93893125679448E-01+I*(-5.02031526376158E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.01884050876158E+00+I*(4.87181959718463E-01):b := -6.80743129352738E-02+I*(-1.51670229249396E-01):c := 9.32437362863718E-01+I*(-6.42485619960193E-01):d := -8.68640112970586E-01+I*(-2.64917671080468E-01):e := -3.42072706640844E-01+I*(3.21048563255374E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 9.20363467700213E-01+I*(7.62981226039349E-01):b := -3.09030305191446E-01+I*(1.06851596797517E-01):c := 1.23226572258367E+00+I*(-6.55428242865107E-01):d := -8.88551042577099E-01+I*(-1.89939557585247E-01):e := -3.16495714704845E-01+I*(7.82492879553965E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.67645326468652E-01+I*(9.10955899587917E-01):b := -6.59787930712000E-01+I*(1.50007278763733E-01):c := 1.47026692907675E+00+I*(-4.72616912560176E-01):d := -9.51998701911901E-01+I*(-1.45301489235097E-01):e := -3.10839367069626E-01+I*(1.29656826855228E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.78935711998427E-01+I*(8.61866986055483E-01):b := -9.56223798279085E-01+I*(-4.23962065647220E-02):c := 1.53507757273605E+00+I*(-1.79591082216699E-01):d := -1.02929522603005E+00+I*(-1.51890114307922E-01):e := -3.29463071435429E-01+I*(1.86774474807244E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.89325061550112E-01+I*(6.38683733646375E-01):b := -1.05963227094037E+00+I*(-3.80331130076110E-01):c := 1.39637203310333E+00+I*(8.65392055282578E-02):d := -1.08427271224149E+00+I*(-2.06622541907736E-01):e := -3.91441741081041E-01+I*(2.40370718738227E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.87534305756123E-01+I*(3.45836066568376E-01):b := -9.21627375080474E-01+I*(-7.05673985331126E-01):c := 1.11905217371310E+00+I*(2.01248631330139E-01):d := -1.09120658374118E+00+I*(-2.83888860877410E-01):e := -5.12740523589444E-01+I*(2.30927260072808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.74401359154502E-01+I*(1.20350662886567E-01):b := -6.06783135225824E-01+I*(-8.66193234572874E-01):c := 8.32879038840965E-01+I*(1.10863380002982E-01):d := -1.04685240499303E+00+I*(-3.47535301851550E-01):e := -5.72422786604238E-01+I*(8.95503828816812E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.62489050664181E-01+I*(6.77346489747888E-02):b := -2.62418670308370E-01+I*(-7.86780137108399E-01):c := 6.71756218753729E-01+I*(-1.42324284837061E-01):d := -9.71963989175079E-01+I*(-3.67780987746956E-01):e := -4.83576622521737E-01+I*(-8.04838378656176E-03):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.62300730025561E-01+I*(4.24115568247250E-01):b := 4.85697591148797E-02+I*(-4.41071695668378E-01):c := 9.13069261511547E-01+I*(-3.96678792310807E-01):d := -8.89557530781513E-01+I*(-6.41743115652810E-01):e := -3.58443859857169E-01+I*(8.96066334074223E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.64143291097406E-01+I*(6.98689885461494E-01):b := 3.01613868273141E-02+I*(-8.81489610981763E-02):c := 1.13443175272437E+00+I*(-5.99319371327125E-01):d := -8.56615185411516E-01+I*(-5.71508049605846E-01):e := -3.03543982377084E-01+I*(9.76889227856684E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.65666250036042E-01+I*(9.74489151782379E-01):b := -2.10794605428858E-01+I*(1.70372864948737E-01):c := 1.43426011244433E+00+I*(-6.12261994232039E-01):d := -8.76526115018029E-01+I*(-4.96529936110625E-01):e := -2.68280425094351E-01+I*(1.24724665010386E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.12948108804481E-01+I*(1.12246382533095E+00):b := -5.61552230949413E-01+I*(2.13528546914952E-01):c := 1.67226131893740E+00+I*(-4.29450663927108E-01):d := -9.39973774352830E-01+I*(-4.51891867760475E-01):e := -2.49106540179129E-01+I*(1.61371291370364E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.24238494334257E-01+I*(1.07337491179851E+00):b := -8.57988098516497E-01+I*(2.11250615864973E-02):c := 1.73707196259671E+00+I*(-1.36424833583631E-01):d := -1.01727029847098E+00+I*(-4.58480492833300E-01):e := -2.47107058262269E-01+I*(2.06330459274327E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.46278438859412E-02+I*(8.50191659389405E-01):b := -9.61396571177780E-01+I*(-3.16809861924891E-01):c := 1.59836642296399E+00+I*(1.29705454161326E-01):d := -1.07224778468242E+00+I*(-5.13212920433114E-01):e := -2.73028721389086E-01+I*(2.56921242057438E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.28370880919528E-02+I*(5.57343992311406E-01):b := -8.23391675317887E-01+I*(-6.42152717179907E-01):c := 1.32104656357375E+00+I*(2.44414879963207E-01):d := -1.07918165618211E+00+I*(-5.90479239402788E-01):e := -3.46360766828355E-01+I*(2.87619906203597E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.19704141490332E-01+I*(3.31858588629597E-01):b := -5.08547435463237E-01+I*(-8.02671966421655E-01):c := 1.03487342870162E+00+I*(1.54029628636049E-01):d := -1.03482747743396E+00+I*(-6.54125680376927E-01):e := -4.34414764333895E-01+I*(2.31556491984346E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07791833000011E-01+I*(2.79242574717819E-01):b := -1.64182970545782E-01+I*(-7.23258868957180E-01):c := 8.73750608614385E-01+I*(-9.91580362039930E-02):d := -9.59939061616010E-01+I*(-6.74371366272335E-01):e := -4.24906395379115E-01+I*(1.29034497155947E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.07841112049835E-01+I*(4.86702584670811E-01):b := 8.29919869147348E-02+I*(-3.29266890544988E-01):c := 1.04005921162753E+00+I*(-2.33772036386531E-01):d := -6.83273405280760E-01+I*(-8.68875496993573E-01):e := -3.40880787364240E-01+I*(1.87895999554134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 6.09683673121682E-01+I*(7.61276901885054E-01):b := 6.45836146271691E-02+I*(2.36558440252140E-02):c := 1.26142170284035E+00+I*(-4.36412615402851E-01):d := -6.50331059910765E-01+I*(-7.98640430946607E-01):e := -2.83796635415725E-01+I*(1.67978155985338E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.11206632060317E-01+I*(1.03707616820594E+00):b := -1.76372377629003E-01+I*(2.82177670072127E-01):c := 1.56125006256031E+00+I*(-4.49355238307764E-01):d := -6.70241989517277E-01+I*(-7.23662317451387E-01):e := -2.38684069479832E-01+I*(1.78286180831575E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.58488490828757E-01+I*(1.18505084175451E+00):b := -5.27130003149558E-01+I*(3.25333352038343E-01):c := 1.79925126905338E+00+I*(-2.66543908002833E-01):d := -7.33689648852079E-01+I*(-6.79024249101237E-01):e := -2.06965883944672E-01+I*(2.03897690013520E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02211236414676E-02+I*(1.13596192822207E+00):b := -8.23565870716642E-01+I*(1.32929866709888E-01):c := 1.86406191271269E+00+I*(2.64819223406428E-02):d := -8.10986172970227E-01+I*(-6.85612874174062E-01):e := -1.88358016871795E-01+I*(2.41443648580289E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.19831774089783E-01+I*(9.12778675812966E-01):b := -9.26974343377925E-01+I*(-2.05005056801500E-01):c := 1.72535637307997E+00+I*(2.92612210085600E-01):d := -8.65963659181664E-01+I*(-7.40345301773876E-01):e := -1.89424418559780E-01+I*(2.91583239035767E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.21622529883772E-01+I*(6.19931008734967E-01):b := -7.88969447518032E-01+I*(-5.30347912056517E-01):c := 1.44803651368973E+00+I*(4.07321635887482E-01):d := -8.72897530681359E-01+I*(-8.17611620743550E-01):e := -2.30302338837558E-01+I*(3.46014344577744E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.47554764853935E-02+I*(3.94445605053158E-01):b := -4.74125207663382E-01+I*(-6.90867161298265E-01):c := 1.16186337881760E+00+I*(3.16936384560325E-01):d := -8.28543351933208E-01+I*(-8.81258061717690E-01):e := -3.23705791295100E-01+I*(3.51686362670072E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.53332215024286E-01+I*(3.41829591141380E-01):b := -1.29760742745927E-01+I*(-6.11454063833789E-01):c := 1.00074055873037E+00+I*(6.37487197202819E-02):d := -7.53654936115258E-01+I*(-9.01503747613097E-01):e := -3.78686427336821E-01+I*(2.63561091138990E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.72683577017041E-01+I*(3.71083531213108E-01):b := 3.74941998038554E-02+I*(-2.21493259338660E-01):c := 1.03262471300348E+00+I*(-2.73506547749378E-02):d := -3.79252716752812E-01+I*(-9.10272115625137E-01):e := -3.44321123505347E-01+I*(3.13730088303176E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.74526138088887E-01+I*(6.45657848427351E-01):b := 1.90858275162896E-02+I*(1.31429475231541E-01):c := 1.25398720421630E+00+I*(-2.29991233791256E-01):d := -3.46310371382815E-01+I*(-8.40037049578172E-01):e := -2.84078360780873E-01+I*(2.55450579679708E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.76049097027524E-01+I*(9.21457114748237E-01):b := -2.21870164739882E-01+I*(3.89951301278454E-01):c := 1.55381556393626E+00+I*(-2.42933856696171E-01):d := -3.66221300989328E-01+I*(-7.65058936082951E-01):e := -2.24906998552077E-01+I*(2.45808505035260E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.33309557959614E-02+I*(1.06943178829681E+00):b := -5.72627790260438E-01+I*(4.33106983244670E-01):c := 1.79181677042933E+00+I*(-6.01225263912381E-02):d := -4.29668960324129E-01+I*(-7.20420867732802E-01):e := -1.77623198821669E-01+I*(2.60281151179092E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.65378658674262E-01+I*(1.02034287476437E+00):b := -8.69063657827521E-01+I*(2.40703497916216E-01):c := 1.85662741408864E+00+I*(2.32903303952237E-01):d := -5.06965484442278E-01+I*(-7.27009492805627E-01):e := -1.41023424069153E-01+I*(2.91412958190807E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.54989309122578E-01+I*(7.97159622355264E-01):b := -9.72472130488804E-01+I*(-9.72314255951722E-02):c := 1.71792187445592E+00+I*(4.99033591697194E-01):d := -5.61942970653715E-01+I*(-7.81741920405441E-01):e := -1.17855900302095E-01+I*(3.41370357154237E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.56780064916567E-01+I*(5.04311955277264E-01):b := -8.34467234628911E-01+I*(-4.22574280850189E-01):c := 1.44060201506568E+00+I*(6.13743017499076E-01):d := -5.68876842153410E-01+I*(-8.59008239375115E-01):e := -1.25779707188384E-01+I*(4.14647450033802E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.69913011518188E-01+I*(2.78826551595455E-01):b := -5.19622994774260E-01+I*(-5.83093530091937E-01):c := 1.15442888019355E+00+I*(5.23357766171919E-01):d := -5.24522663405258E-01+I*(-9.22654680349255E-01):e := -2.08611030015610E-01+I*(4.82961608259156E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.81746799914910E-02+I*(2.26210537683677E-01):b := -1.75258529856806E-01+I*(-5.03680432627462E-01):c := 9.93306060106314E-01+I*(2.70170101331876E-01):d := -4.49634247587308E-01+I*(-9.42900366244661E-01):e := -3.35118748886803E-01+I*(4.33611946816509E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.66860949053909E-01+I*(1.31357847949651E-01):b := -6.66346819769976E-02+I*(-1.68179281861328E-01):c := 8.94244450170837E-01+I*(1.25998493949795E-01):d := -1.19750124173482E-01+I*(-7.46563033617627E-01):e := -4.14854338359222E-01+I*(5.15867011585036E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.68703510125755E-01+I*(4.05932165163894E-01):b := -8.50430542645634E-02+I*(1.84743452708874E-01):c := 1.11560694138366E+00+I*(-7.66420850665247E-02):d := -8.68077788034856E-02+I*(-6.76327967570662E-01):e := -3.34834671921809E-01+I*(3.79785319042119E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.70226469064391E-01+I*(6.81731431484780E-01):b := -3.25999046520735E-01+I*(4.43265278755787E-01):c := 1.41543530110362E+00+I*(-8.95847079714385E-02):d := -1.06718708409998E-01+I*(-6.01349854075441E-01):e := -2.42865705400799E-01+I*(3.40960737838450E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.24916721671702E-02+I*(8.29706105033349E-01):b := -6.76756672041291E-01+I*(4.86420960722003E-01):c := 1.65343650759669E+00+I*(9.32266223334930E-02):d := -1.70166367744800E-01+I*(-5.56711785725291E-01):e := -1.67588230599986E-01+I*(3.43242551975959E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.71201286637395E-01+I*(7.80617191500913E-01):b := -9.73192539608374E-01+I*(2.94017475393548E-01):c := 1.71824715125600E+00+I*(3.86252452676970E-01):d := -2.47462891862947E-01+I*(-5.63300410798116E-01):e := -1.03631843886170E-01+I*(3.69030583210694E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.60811937085710E-01+I*(5.57433939091806E-01):b := -1.07660101226966E+00+I*(-4.39174481178398E-02):c := 1.57954161162328E+00+I*(6.52382740421926E-01):d := -3.02440378074385E-01+I*(-6.18032838397930E-01):e := -4.71657656691037E-02+I*(4.20476040214373E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -5.62602692879699E-01+I*(2.64586272013807E-01):b := -9.38596116409764E-01+I*(-3.69260303372857E-01):c := 1.30222175223304E+00+I*(7.67092166223808E-01):d := -3.09374249574080E-01+I*(-6.95299157367604E-01):e := -7.90248154188973E-03+I*(5.15400658154419E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.75735639481321E-01+I*(3.91008683319980E-02):b := -6.23751876555114E-01+I*(-5.29779552614605E-01):c := 1.01604861736091E+00+I*(6.76706914896651E-01):d := -2.65020070825929E-01+I*(-7.58945598341744E-01):e := -5.17954958986346E-02+I*(6.73385502134134E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.76479479716411E-02+I*(-1.35151455797804E-02):b := -2.79387411637660E-01+I*(-4.50366455150129E-01):c := 8.54925797273674E-01+I*(4.23519250056608E-01):d := -1.90131655007978E-01+I*(-7.79191284237150E-01):e := -2.95969933574591E-01+I*(7.31168367086094E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.39888811871895E-01+I*(-1.20304153666390E-01):b := -1.80671597378949E-01+I*(-1.94271160693494E-01):c := 6.89668086034314E-01+I*(1.54521638813414E-01):d := -2.61897746607036E-02+I*(-4.54349549866137E-01):e := -8.87074800490658E-01+I*(7.89580661417084E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 3.41731372943741E-01+I*(1.54270163547853E-01):b := -1.99079969666515E-01+I*(1.58651573876708E-01):c := 9.11030577247139E-01+I*(-4.81189402029055E-02):d := 6.75257070929252E-03+I*(-3.84114483819172E-01):e := -5.73401127429147E-01+I*(5.01303842804138E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.43254331882377E-01+I*(4.30069429868739E-01):b := -4.40035961922688E-01+I*(4.17173399923621E-01):c := 1.21085893696709E+00+I*(-6.10615631078190E-02):d := -1.31583588972203E-02+I*(-3.09136370323951E-01):e := -3.67633365009900E-01+I*(4.57164373951990E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.46380934918404E-03+I*(5.78044103417307E-01):b := -7.90793587443242E-01+I*(4.60329081889836E-01):c := 1.44886014346017E+00+I*(1.21749767197112E-01):d := -7.66060182320218E-02+I*(-2.64498301973801E-01):e := -2.24487489102140E-01+I*(4.68789974389857E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.98173423819409E-01+I*(5.28955189884872E-01):b := -1.08722945501033E+00+I*(2.67925596561381E-01):c := 1.51367078711948E+00+I*(4.14775597540589E-01):d := -1.53902542350169E-01+I*(-2.71086927046626E-01):e := -1.03677731347865E-01+I*(5.06656590110287E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.87784074267724E-01+I*(3.05771937475765E-01):b := -1.19063792767161E+00+I*(-7.00093269500064E-02):c := 1.37496524748676E+00+I*(6.80905885285546E-01):d := -2.08880028561607E-01+I*(-3.25819354646441E-01):e := 1.80747063587241E-02+I*(5.77009111732330E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -4.89574830061713E-01+I*(1.29242703977656E-02):b := -1.05263303181172E+00+I*(-3.95352182205023E-01):c := 1.09764538809652E+00+I*(7.95615311087427E-01):d := -2.15813900061302E-01+I*(-4.03085673616114E-01):e := 1.57196328013065E-01+I*(7.21941806964754E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -3.02707776663334E-01+I*(-2.12561133284043E-01):b := -7.37788791957065E-01+I*(-5.55871431446771E-01):c := 8.11472253224387E-01+I*(7.05230059760270E-01):d := -1.71459721313151E-01+I*(-4.66732114590255E-01):e := 2.61884892704971E-01+I*(1.10194466775494E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.46200851536552E-02+I*(-2.65177147195821E-01):b := -3.93424327039611E-01+I*(-4.76458333982295E-01):c := 6.50349433137152E-01+I*(4.52042394920227E-01):d := -9.65713054952005E-02+I*(-4.86977800485661E-01):e := -4.70058007296745E-01+I*(1.65963621887863E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.57596616844173E-01+I*(-2.66147026167268E-01):b := -2.51257406306285E-01+I*(-2.87560215750655E-01):c := 5.14619174986417E-01+I*(4.48724833347883E-02):d := -1.42349595558967E-01+I*(-1.70361601009114E-01):e := -1.25000691204745E+00+I*(-1.87334694807195E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 5.59439177916019E-01+I*(8.42729104697470E-03):b := -2.69665778593851E-01+I*(6.53625188195464E-02):c := 7.35981666199242E-01+I*(-1.57768095681531E-01):d := -1.09407250188971E-01+I*(-1.00126534962149E-01):e := -8.52842652170654E-01+I*(1.39711766967233E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.60962136854655E-01+I*(2.84226557367861E-01):b := -5.10621770850023E-01+I*(3.23884344866459E-01):c := 1.03581002591920E+00+I*(-1.70710718586445E-01):d := -1.29318179795484E-01+I*(-2.51484214669289E-02):e := -6.37409191321365E-01+I*(3.39798440149814E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.08243995623095E-01+I*(4.32201230916429E-01):b := -8.61379396370577E-01+I*(3.67040026832675E-01):c := 1.27381123241227E+00+I*(1.21006117184866E-02):d := -1.92765839130285E-01+I*(1.94896468832214E-02):e := -4.71302186483256E-01+I*(5.06606762017250E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.04656188471303E-02+I*(3.83112317383994E-01):b := -1.15781526393766E+00+I*(1.74636541504220E-01):c := 1.33862187607158E+00+I*(3.05126442061963E-01):d := -2.70062363248433E-01+I*(1.29010218103962E-02):e := -3.04916092864599E-01+I*(6.85961006468464E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.70076269295445E-01+I*(1.59929064974887E-01):b := -1.26122373659894E+00+I*(-1.63298382007167E-01):c := 1.19991633643886E+00+I*(5.71256729806920E-01):d := -3.25039849459870E-01+I*(-4.18314057894179E-02):e := -8.84741209145571E-02+I*(9.40202423205808E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -2.71867025089435E-01+I*(-1.32918602103113E-01):b := -1.12321884073905E+00+I*(-4.88641237262184E-01):c := 9.22596477048623E-01+I*(6.85966155608801E-01):d := -3.31973720959566E-01+I*(-1.19097724759092E-01):e := 3.09530527126687E-01+I*(1.48504680170877E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -8.49999716910560E-02+I*(-3.58404005784921E-01):b := -8.08374600884401E-01+I*(-6.49160486503932E-01):c := 6.36423342176490E-01+I*(5.95580904281645E-01):d := -2.87619542211414E-01+I*(-1.82744165733232E-01):e := 1.42236216946676E+00+I*(5.10220656829437E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 2.03087719818623E-01+I*(-4.11020019696700E-01):b := -4.64010135966947E-01+I*(-5.69747389039457E-01):c := 4.75300522089255E-01+I*(3.42393239441602E-01):d := -2.12731126393464E-01+I*(-2.02989851628638E-01):e := -2.80002869257197E+00+I*(-1.07275640777478E+00):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.18116462471476E-01+I*(-2.37929268646842E-01):b := -2.45364224288020E-01+I*(-4.04395461379207E-01):c := 4.51005047958400E-01+I*(-1.51642914023011E-01):d := -4.13877115697366E-01+I*(-2.74803044912469E-02):e := -6.44562532066516E-01+I*(-2.59390720561233E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 8.19959023543322E-01+I*(3.66450485674014E-02):b := -2.63772596575586E-01+I*(-5.14727268090051E-02):c := 6.72367539171226E-01+I*(-3.54283493039330E-01):d := -3.80934770327370E-01+I*(4.27547615557183E-02):e := -5.79132164055228E-01+I*(-7.96241767899849E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 7.21481982481957E-01+I*(3.12444314888287E-01):b := -5.04728588831757E-01+I*(2.07049099237908E-01):c := 9.72195898891181E-01+I*(-3.67226115944244E-01):d := -4.00845699933883E-01+I*(1.17732875050939E-01):e := -5.54147799036377E-01+I*(7.22009985001184E-02):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.68763841250396E-01+I*(4.60418988436856E-01):b := -8.55486214352312E-01+I*(2.50204781204123E-01):c := 1.21019710538425E+00+I*(-1.84414785639312E-01):d := -4.64293359268684E-01+I*(1.62370943401089E-01):e := -5.54931465847275E-01+I*(2.30345809478993E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.80054226780172E-01+I*(4.11330074904421E-01):b := -1.15192208191940E+00+I*(5.78012958756690E-02):c := 1.27500774904356E+00+I*(1.08611044704164E-01):d := -5.41589883386832E-01+I*(1.55782318328264E-01):e := -5.97052592522207E-01+I*(4.35133480721387E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -9.55642366814374E-03+I*(1.88146822495314E-01):b := -1.25533055458068E+00+I*(-2.80133627635719E-01):c := 1.13630220941084E+00+I*(3.74741332449121E-01):d := -5.96567369598269E-01+I*(1.01049890728449E-01):e := -7.88094134001552E-01+I*(7.66589738895862E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := -1.13471794621325E-02+I*(-1.04700844582686E-01):b := -1.11732565872079E+00+I*(-6.05476482890736E-01):c := 8.58982350020607E-01+I*(4.89450758251002E-01):d := -6.03501241097965E-01+I*(2.37835717587758E-02):e := -1.85320884491589E+00+I*(9.98120110818909E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 1.75519873936246E-01+I*(-3.30186248264495E-01):b := -8.02481418866136E-01+I*(-7.65995732132484E-01):c := 5.72809215148473E-01+I*(3.99065506923845E-01):d := -5.59147062349813E-01+I*(-3.98628692153643E-02):e := -1.62575978765842E+00+I*(-7.71314732877699E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.63607565445925E-01+I*(-3.82802262176273E-01):b := -4.58116953948682E-01+I*(-6.86582634668008E-01):c := 4.11686395061238E-01+I*(1.45877842083802E-01):d := -4.84258646531863E-01+I*(-6.01085551107704E-02):e := -8.32740584567082E-01+I*(-5.19740316030978E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.76475571999980E-01+I*(1.34362698410693E+00):b := -5.45438500038628E-01+I*(-3.15352732794887E-01):c := 1.61091849504789E+00+I*(4.08203372822907E-01):d := -7.60776109479709E-01+I*(-5.81981380525629E-01):e := -2.16331016556197E-01+I*(2.30736230057938E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
-a := 4.76475571999980E-01+I*(1.34362698410693E+00):b := -5.45438500038628E-01+I*(-3.15352732794887E-01):c := 1.61091849504789E+00+I*(4.08203372822907E-01):d := -7.60776109479709E-01+I*(-5.81981380525629E-01):e := -2.16331016556197E-01+I*(2.30736230057938E-01):
-a:=a/e:b:=b/e:c:=c/e:d:=d/e:
-if abs(eqs[1])<0.1 then print(eqs); fi:
diff --git a/sandbox/801/polsys.mod b/sandbox/801/polsys.mod
deleted file mode 100644
index 5874087..0000000
--- a/sandbox/801/polsys.mod
+++ /dev/null
@@ -1,222 +0,0 @@
-GFORTRAN module version '0' created from Src/polsys_plp.f90 on Fri Dec 10 14:53:52 2010
-MD5:ea1f6d6db9bd5b31681cfc31907f127b -- If you edit this, you'll get what you deserve.
-
-(() () () ()
-() () () () () () () () () () () () () () () () () () () () () () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'bezout_plp' 'polsys' 'bezout_plp' 1 ((PROCEDURE UNKNOWN-INTENT
-MODULE-PROC DECL UNKNOWN SUBROUTINE) (UNKNOWN 0 0 0 UNKNOWN ()) 3 0 (4 5
-6 7) () 0 () () () 0 0)
-8 'c' 'global_plp' 'c' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 9 0 (10 11) () 8 () () () 0
-0)
-12 'd' 'global_plp' 'd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 13 0 (14 15 16) () 12 () ()
-() 0 0)
-17 'global_plp' 'global_plp' 'global_plp' 1 ((MODULE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 ()
-() () 0 0)
-18 'large' 'global_plp' 'large' 1 ((PARAMETER UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-19 'numt' 'global_plp' 'numt' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 20 0 (21) () 19 () ()
-() 0 0)
-22 'numv' 'global_plp' 'numv' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 23 0 (24 25) () 22 ()
-() () 0 0)
-26 'par' 'global_plp' 'par' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC
-DECL UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 27 0 (28 29 30) () 26
-() () () 0 0)
-31 'partition' 'global_plp' 'partition' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 32 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-33 'partition_sizes' 'global_plp' 'partition_sizes' 1 ((VARIABLE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-32 'partition_type' 'global_plp' 'partition_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((34 'set' (DERIVED 35 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-36 'pi' 'global_plp' 'pi' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (REAL 8 0 0 REAL ()) 0 0 () (CONSTANT (REAL 8 0 0
-REAL ()) 0 '0.3243f6a8885a30@1') () 0 () () () 0 0)
-37 'polsys' 'polsys' 'polsys' 1 ((MODULE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ()) 0 0 () () 0 () () () 0 0)
-38 'polsys_plp' 'polsys' 'polsys_plp' 1 ((PROCEDURE UNKNOWN-INTENT
-MODULE-PROC DECL UNKNOWN SUBROUTINE ALWAYS_EXPLICIT) (UNKNOWN 0 0 0
-UNKNOWN ()) 39 0 (40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56) ()
-0 () () () 0 0)
-57 'polynomial' 'global_plp' 'polynomial' 1 ((VARIABLE UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN ALLOCATABLE DIMENSION) (DERIVED 58 0 0
-DERIVED ()) 0 0 () (1 DEFERRED () ()) 0 () () () 0 0)
-58 'polynomial_type' 'global_plp' 'polynomial_type' 1 ((DERIVED
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0
-UNKNOWN ()) 0 0 () () 0 ((59 'term' (DERIVED 60 0 0 DERIVED ()) (1
-DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION POINTER) UNKNOWN-ACCESS ()) (61 'num_terms' (INTEGER 4 0 0
-INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN)
-UNKNOWN-ACCESS ())) PUBLIC (() ()) () 0 0)
-62 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-63 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-64 'sc' 'global_plp' 'sc' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (COMPLEX 8 0 0 COMPLEX ()) 65 0 (66 67 68) () 64 () ()
-() 0 0)
-69 'sd' 'global_plp' 'sd' 1 ((PROCEDURE UNKNOWN-INTENT MODULE-PROC DECL
-UNKNOWN FUNCTION) (INTEGER 4 0 0 INTEGER ()) 70 0 (71 72) () 69 () () ()
-0 0)
-73 'selected_int_kind' '(intrinsic)' 'selected_int_kind' 1 ((PROCEDURE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4 0 0 REAL ())
-0 0 () () 73 () () () 0 0)
-35 'set_type' 'global_plp' 'set_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((74 'index' (INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER)
-UNKNOWN-ACCESS ()) (75 'num_indices' (INTEGER 4 0 0 INTEGER ()) () (
-UNKNOWN-FL UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ())
-(76 'set_deg' (INTEGER 4 0 0 INTEGER ()) () (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (77 'start_coef' (
-COMPLEX 8 0 0 COMPLEX ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-78 'singsys_plp' 'polsys' 'singsys_plp' 1 ((PROCEDURE UNKNOWN-INTENT
-MODULE-PROC DECL UNKNOWN SUBROUTINE) (UNKNOWN 0 0 0 UNKNOWN ()) 79 0 (
-80 81 82 83 84 85 86) () 0 () () () 0 0)
-60 'term_type' 'global_plp' 'term_type' 1 ((DERIVED UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN POINTER_COMP) (UNKNOWN 0 0 0 UNKNOWN ()) 0
-0 () () 0 ((87 'coef' (COMPLEX 8 0 0 COMPLEX ()) () (UNKNOWN-FL
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) UNKNOWN-ACCESS ()) (88 'deg'
-(INTEGER 4 0 0 INTEGER ()) (1 DEFERRED () ()) (UNKNOWN-FL UNKNOWN-INTENT
-UNKNOWN-PROC UNKNOWN UNKNOWN DIMENSION POINTER) UNKNOWN-ACCESS ()))
-PUBLIC (() ()) () 0 0)
-42 'finaltol' '' 'finaltol' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-43 'singtol' '' 'singtol' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN
-UNKNOWN DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-40 'n' '' 'n' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-54 'recall' '' 'recall' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-OPTIONAL DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () () 0 0)
-55 'no_scaling' '' 'no_scaling' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN OPTIONAL DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () ()
-0 0)
-56 'user_f_df' '' 'user_f_df' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN OPTIONAL DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () ()
-0 0)
-47 'iflag2' '' 'iflag2' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION POINTER DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0
-() (1 DEFERRED () ()) 0 () () () 0 0)
-48 'arclen' '' 'arclen' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION POINTER DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-49 'lambda' '' 'lambda' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION POINTER DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-50 'roots' '' 'roots' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION POINTER DUMMY) (COMPLEX 8 0 0 COMPLEX ()) 0 0 () (2
-DEFERRED () () () ()) 0 () () () 0 0)
-51 'nfe' '' 'nfe' 39 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION POINTER DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () (1
-DEFERRED () ()) 0 () () () 0 0)
-52 'scale_factors' '' 'scale_factors' 39 ((VARIABLE INOUT UNKNOWN-PROC
-UNKNOWN UNKNOWN DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1
-ASSUMED_SHAPE (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') ()) 0 () () ()
-0 0)
-53 'numrr' '' 'numrr' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN
-OPTIONAL DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-41 'tracktol' '' 'tracktol' 39 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN DUMMY) (REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-11 'j' '' 'j' 9 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-10 'i' '' 'i' 9 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-25 'j' '' 'j' 23 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-24 'i' '' 'i' 23 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-44 'sspar' '' 'sspar' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (1 EXPLICIT (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '1') (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0
-'8')) 0 () () () 0 0)
-45 'bplp' '' 'bplp' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-46 'iflag1' '' 'iflag1' 39 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-71 'i' '' 'i' 70 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-72 'j' '' 'j' 70 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-21 'i' '' 'i' 20 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-15 'j' '' 'j' 13 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-16 'k' '' 'k' 13 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-14 'i' '' 'i' 13 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-28 'i' '' 'i' 27 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-30 'k' '' 'k' 27 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-29 'j' '' 'j' 27 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-66 'i' '' 'i' 65 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-68 'k' '' 'k' 65 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-67 'j' '' 'j' 65 ((VARIABLE UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-4 'n' '' 'n' 3 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-5 'maxt' '' 'maxt' 3 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-6 'tol' '' 'tol' 3 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY)
-(REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-7 'bplp' '' 'bplp' 3 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY)
-(INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-80 'n' '' 'n' 79 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-INTEGER 4 0 0 INTEGER ()) 0 0 () () 0 () () () 0 0)
-81 'lex_num' '' 'lex_num' 79 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () (1 EXPLICIT (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (VARIABLE (INTEGER 4 0 0
-INTEGER ()) 0 80 ())) 0 () () () 0 0)
-82 'lex_save' '' 'lex_save' 79 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION DUMMY) (INTEGER 4 0 0 INTEGER ()) 0 0 () (1 EXPLICIT (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (VARIABLE (INTEGER 4 0 0
-INTEGER ()) 0 80 ())) 0 () () () 0 0)
-83 'tol' '' 'tol' 79 ((VARIABLE IN UNKNOWN-PROC UNKNOWN UNKNOWN DUMMY) (
-REAL 8 0 0 REAL ()) 0 0 () () 0 () () () 0 0)
-84 'rand_mat' '' 'rand_mat' 79 ((VARIABLE IN UNKNOWN-PROC UNKNOWN
-UNKNOWN DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (2 EXPLICIT (
-CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (VARIABLE (INTEGER 4 0 0
-INTEGER ()) 0 80 ()) (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (
-VARIABLE (INTEGER 4 0 0 INTEGER ()) 0 80 ())) 0 () () () 0 0)
-85 'mat' '' 'mat' 79 ((VARIABLE INOUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DIMENSION DUMMY) (REAL 8 0 0 REAL ()) 0 0 () (2 EXPLICIT (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '1') (OP (INTEGER 4 0 0 INTEGER ()) 0 PLUS (
-VARIABLE (INTEGER 4 0 0 INTEGER ()) 0 80 ()) (CONSTANT (INTEGER 4 0 0
-INTEGER ()) 0 '1')) (CONSTANT (INTEGER 4 0 0 INTEGER ()) 0 '1') (
-VARIABLE (INTEGER 4 0 0 INTEGER ()) 0 80 ())) 0 () () () 0 0)
-86 'nonsing' '' 'nonsing' 79 ((VARIABLE OUT UNKNOWN-PROC UNKNOWN UNKNOWN
-DUMMY) (LOGICAL 4 0 0 LOGICAL ()) 0 0 () () 0 () () () 0 0)
-)
-
-('bezout_plp' 0 2 'c' 0 8 'd' 0 12 'global_plp' 0 17 'large' 0 18 'numt'
-0 19 'numv' 0 22 'par' 0 26 'partition' 0 31 'partition_sizes' 0 33
-'partition_type' 0 32 'pi' 0 36 'polsys' 0 37 'polsys_plp' 0 38
-'polynomial' 0 57 'polynomial_type' 0 58 'r8' 0 62 'real_precision' 0 63
-'sc' 0 64 'sd' 0 69 'selected_int_kind' 0 73 'set_type' 0 35 'singsys_plp'
-0 78 'term_type' 0 60)
diff --git a/sandbox/801/polsys.pdf b/sandbox/801/polsys.pdf
deleted file mode 100644
index 40226eb..0000000
Binary files a/sandbox/801/polsys.pdf and /dev/null differ
diff --git a/sandbox/801/polsys_plp.o b/sandbox/801/polsys_plp.o
deleted file mode 100644
index 8d55bf2..0000000
Binary files a/sandbox/801/polsys_plp.o and /dev/null differ
diff --git a/sandbox/801/real_precision.mod b/sandbox/801/real_precision.mod
deleted file mode 100644
index 1a1f591..0000000
--- a/sandbox/801/real_precision.mod
+++ /dev/null
@@ -1,26 +0,0 @@
-GFORTRAN module version '0' created from Src/polsys_plp.f90 on Fri Dec 10 14:53:52 2010
-MD5:091ad80a20a08fac65d225d1cb0c232e -- If you edit this, you'll get what you deserve.
-
-(() () () () () () () () () () () () () () () () () () () () () () () ()
-() () ())
-
-()
-
-()
-
-()
-
-()
-
-(2 'r8' 'real_precision' 'r8' 1 ((PARAMETER UNKNOWN-INTENT UNKNOWN-PROC
-UNKNOWN IMPLICIT-SAVE) (INTEGER 4 0 0 INTEGER ()) 0 0 () (CONSTANT (
-INTEGER 4 0 0 INTEGER ()) 0 '8') () 0 () () () 0 0)
-3 'real_precision' 'real_precision' 'real_precision' 1 ((MODULE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN) (UNKNOWN 0 0 0 UNKNOWN ())
-0 0 () () 0 () () () 0 0)
-4 'selected_real_kind' '(intrinsic)' 'selected_real_kind' 1 ((PROCEDURE
-UNKNOWN-INTENT UNKNOWN-PROC UNKNOWN UNKNOWN FUNCTION) (REAL 4 0 0 REAL ())
-0 0 () () 4 () () () 0 0)
-)
-
-('r8' 0 2 'real_precision' 0 3 'selected_real_kind' 0 4)
diff --git a/sandbox/857/857.head b/sandbox/857/857.head
deleted file mode 100644
index 0cb42ad..0000000
--- a/sandbox/857/857.head
+++ /dev/null
@@ -1,3 +0,0 @@
-C      ALGORITHM 857, COLLECTED ALGORITHMS FROM ACM.
-C      THIS WORK PUBLISHED IN TRANSACTIONS ON MATHEMATICAL SOFTWARE,
-C      VOL. 32, NO. 4,  December, 2006, P. 561--579.
diff --git a/sandbox/857/INPUT.DAT b/sandbox/857/INPUT.DAT
deleted file mode 100644
index 1226669..0000000
--- a/sandbox/857/INPUT.DAT
+++ /dev/null
@@ -1,997 +0,0 @@
-&PROBLEM  NEW_PROBLEM=.TRUE.
-TITLE='TWO QUADRICS, NO SOLUTIONS AT INFINITY, TWO REAL SOLUTIONS.'
-
-TRACKTOL = 1.0D-4  FINALTOL = 1.0D-14  SINGTOL = 0.0  SSPAR(5) = 1.0D0
-NUMRR = 1
-N = 2
-
-NUM_TERMS(1) = 6
-COEF(1,1) = (-9.80D-04,0.0)   DEG(1,1,1) = 2
-COEF(1,2) = ( 9.78D+05,0.0)   DEG(1,2,2) = 2
-COEF(1,3) = (-9.80D+00,0.0)   DEG(1,3,1) = 1 DEG(1,3,2) = 1
-COEF(1,4) = (-2.35D+02,0.0)   DEG(1,4,1) = 1
-COEF(1,5) = ( 8.89D+04,0.0)   DEG(1,5,2) = 1
-COEF(1,6) = (-1.00D+00,0.0)
-
-NUM_TERMS(2) = 6
-COEF(2,1) = (-1.00D-02,0.0)   DEG(2,1,1) = 2
-COEF(2,2) = (-9.84D-01,0.0)   DEG(2,2,2) = 2
-COEF(2,3) = (-2.97D+01,0.0)   DEG(2,3,1) = 1 DEG(2,3,2) = 1
-COEF(2,4) = ( 9.87D-03,0.0)   DEG(2,4,1) = 1
-COEF(2,5) = (-1.24D-01,0.0)   DEG(2,5,2) = 1
-COEF(2,6) = (-2.50D-01,0.0)                     /
-
-&SYSGLPSET  ROOT_COUNT_ONLY = .FALSE.
-P(1) = '{{x1,x2}}'
-P(2) = '{{x1,x2}}'
-
-DG(1) = '{2}'
-DG(2) = '{2}'
-
-NUM_SETS(1) = 1  NUM_INDICES(1,1) = 2  SET_DEG(1,1) = 2
-INDEX(1,1,1) = 1 INDEX(1,1,2) = 2
-
-NUM_SETS(2) = 1  NUM_INDICES(2,1) = 2  SET_DEG(2,1) = 2
-INDEX(2,1,1) = 1 INDEX(2,1,2) = 2   /
-
-&PROBLEM  NEW_PROBLEM = .TRUE.
-TITLE='PB803, 48 FINITE SOLUTIONS, TOTAL DEGREE 256.'
-
-TRACKTOL = 1.0D-07  FINALTOL = 1.0D-12  SINGTOL = 0.0  SSPAR(5) = 1.0D0
-NUMRR = 1
-N = 8
-
-DEG=40000*0
-
-NUM_TERMS(1) = 17
- DEG(1,1,1) =   1
- DEG(1,1,3) =   1
-COEF(1,1) =       (-0.290965281036386D-01, 0.D0)
- DEG(1,2,1) =   1
- DEG(1,2,4) =   1
-COEF(1,2) =        (0.123862737830566D+00, 0.D0)
- DEG(1,3,2) =   1
- DEG(1,3,3) =   1
-COEF(1,3) =        (0.215085387051146D-01, 0.D0)
- DEG(1,4,2) =   1
- DEG(1,4,4) =   1
-COEF(1,4) =        (0.167560227205193D+00, 0.D0)
- DEG(1,5,5) =   1
- DEG(1,5,7) =   1
-COEF(1,5) =        (0.000000000000000D+00, 0.D0)
- DEG(1,6,5) =   1
- DEG(1,6,8) =   1
-COEF(1,6) =       (-0.700449587631292D-01, 0.D0)
- DEG(1,7,6) =   1
- DEG(1,7,7) =   1
-COEF(1,7) =       (-0.270632938682637D+00, 0.D0)
- DEG(1,8,6) =   1
- DEG(1,8,8) =   1
-COEF(1,8) =        (0.000000000000000D+00, 0.D0)
- DEG(1,9,1) =   1
-COEF(1,9) =       (-0.615842911676544D+00, 0.D0)
- DEG(1,10,2) =   1
-COEF(1,10) =       (0.455239231804051D+00, 0.D0)
- DEG(1,11,3) =   1
-COEF(1,11) =       (0.130935803481163D+00, 0.D0)
- DEG(1,12,4) =   1
-COEF(1,12) =      (-0.129409522551260D+00, 0.D0)
- DEG(1,13,5) =   1
-COEF(1,13) =       (0.418258151868904D+00, 0.D0)
- DEG(1,14,6) =   1
-COEF(1,14) =      (-0.541265877365274D+00, 0.D0)
- DEG(1,15,7) =   1
-COEF(1,15) =       (0.000000000000000D+00, 0.D0)
- DEG(1,16,8) =   1
-COEF(1,16) =       (0.150925910357667D+00, 0.D0)
-COEF(1,17) =      (-0.238536449761034D-01, 0.D0)
-NUM_TERMS(2)=17
- DEG(2,1,1) =   1
- DEG(2,1,3) =   1
-COEF(2,1) =        (0.340782576514583D-01, 0.D0)
- DEG(2,2,1) =   1
- DEG(2,2,4) =   1
-COEF(2,2) =       (-0.156062186852569D+00, 0.D0)
- DEG(2,3,2) =   1
- DEG(2,3,3) =   1
-COEF(2,3) =       (-0.270999143496647D-01, 0.D0)
- DEG(2,4,2) =   1
- DEG(2,4,4) =   1
-COEF(2,4) =       (-0.196248864280182D+00, 0.D0)
- DEG(2,5,5) =   1
- DEG(2,5,7) =   1
-COEF(2,5) =        (0.220738619037920D+00, 0.D0)
- DEG(2,6,5) =   1
- DEG(2,6,8) =   1
-COEF(2,6) =        (0.000000000000000D+00, 0.D0)
- DEG(2,7,6) =   1
- DEG(2,7,7) =   1
-COEF(2,7) =        (0.000000000000000D+00, 0.D0)
- DEG(2,8,6) =   1
- DEG(2,8,8) =   1
-COEF(2,8) =       (-0.852868531952443D+00, 0.D0)
- DEG(2,9,1) =   1
-COEF(2,9) =        (0.721283767677873D+00, 0.D0)
- DEG(2,10,2) =   1
-COEF(2,10) =      (-0.573583559517377D+00, 0.D0)
- DEG(2,11,3) =   1
-COEF(2,11) =       (0.631988450754851D-01, 0.D0)
- DEG(2,12,4) =   1
-COEF(2,12) =       (0.000000000000000D+00, 0.D0)
- DEG(2,13,5) =   1
-COEF(2,13) =      (-0.145259531732747D+00, 0.D0)
- DEG(2,14,6) =   1
-COEF(2,14) =       (0.000000000000000D+00, 0.D0)
- DEG(2,15,7) =   1
-COEF(2,15) =      (-0.475625621282099D+00, 0.D0)
- DEG(2,16,8) =   1
-COEF(2,16) =       (0.000000000000000D+00, 0.D0)
-COEF(2,17) =       (0.191169832725054D-01, 0.D0)
-NUM_TERMS(3)=17
- DEG(3,1,1) =   1
- DEG(3,1,3) =   1
-COEF(3,1) =       (-0.602977987152187D+00, 0.D0)
- DEG(3,2,1) =   1
- DEG(3,2,4) =   1
-COEF(3,2) =       (-0.131668276721907D+00, 0.D0)
- DEG(3,3,2) =   1
- DEG(3,3,3) =   1
-COEF(3,3) =       (-0.758247385552503D+00, 0.D0)
- DEG(3,4,2) =   1
- DEG(3,4,4) =   1
-COEF(3,4) =        (0.104706028642251D+00, 0.D0)
- DEG(3,5,5) =   1
- DEG(3,5,7) =   1
-COEF(3,5) =       (-0.551846547594801D-01, 0.D0)
- DEG(3,6,5) =   1
- DEG(3,6,8) =   1
-COEF(3,6) =        (0.123100969126526D+00, 0.D0)
- DEG(3,7,6) =   1
- DEG(3,7,7) =   1
-COEF(3,7) =        (0.318608752805224D-01, 0.D0)
- DEG(3,8,6) =   1
- DEG(3,8,8) =   1
-COEF(3,8) =        (0.213217132988111D+00, 0.D0)
- DEG(3,9,1) =   1
-COEF(3,9) =       (-0.214660295785905D-01, 0.D0)
- DEG(3,10,2) =   1
-COEF(3,10) =      (-0.601805216517440D+00, 0.D0)
- DEG(3,11,3) =   1
-COEF(3,11) =       (0.000000000000000D+00, 0.D0)
- DEG(3,12,4) =   1
-COEF(3,12) =       (0.244181586600211D+00, 0.D0)
- DEG(3,13,5) =   1
-COEF(3,13) =       (0.363148829331866D-01, 0.D0)
- DEG(3,14,6) =   1
-COEF(3,14) =      (-0.209664074370650D-01, 0.D0)
- DEG(3,15,7) =   1
-COEF(3,15) =      (-0.713438431923148D+00, 0.D0)
- DEG(3,16,8) =   1
-COEF(3,16) =       (0.615504845632630D+00, 0.D0)
-COEF(3,17) =       (0.547700898171009D+00, 0.D0)
-NUM_TERMS(4)=17
- DEG(4,1,1) =   1
- DEG(4,1,3) =   1
-COEF(4,1) =        (0.478568869541663D+00, 0.D0)
- DEG(4,2,1) =   1
- DEG(4,2,4) =   1
-COEF(4,2) =        (0.112420351802601D+00, 0.D0)
- DEG(4,3,2) =   1
- DEG(4,3,3) =   1
-COEF(4,3) =        (0.647403003665440D+00, 0.D0)
- DEG(4,4,2) =   1
- DEG(4,4,4) =   1
-COEF(4,4) =       (-0.831026120840329D-01, 0.D0)
- DEG(4,5,5) =   1
- DEG(4,5,7) =   1
-COEF(4,5) =        (0.390625000000000D-01, 0.D0)
- DEG(4,6,5) =   1
- DEG(4,6,8) =   1
-COEF(4,6) =        (0.175112396907823D-01, 0.D0)
- DEG(4,7,6) =   1
- DEG(4,7,7) =   1
-COEF(4,7) =        (0.676582346706593D-01, 0.D0)
- DEG(4,8,6) =   1
- DEG(4,8,8) =   1
-COEF(4,8) =       (-0.101101189493172D-01, 0.D0)
- DEG(4,9,1) =   1
-COEF(4,9) =        (0.196623270912993D-03, 0.D0)
- DEG(4,10,2) =   1
-COEF(4,10) =       (0.500438376735814D+00, 0.D0)
- DEG(4,11,3) =   1
-COEF(4,11) =      (-0.500000000000000D+00, 0.D0)
- DEG(4,12,4) =   1
-COEF(4,12) =       (0.505897096673464D+00, 0.D0)
- DEG(4,13,5) =   1
-COEF(4,13) =      (-0.264395379672260D-01, 0.D0)
- DEG(4,14,6) =   1
-COEF(4,14) =       (0.195686833484385D+00, 0.D0)
- DEG(4,15,7) =   1
-COEF(4,15) =       (0.195312500000000D+00, 0.D0)
- DEG(4,16,8) =   1
-COEF(4,16) =       (0.226388865536500D+00, 0.D0)
-COEF(4,17) =      (-0.339187450014371D+00, 0.D0)
-NUM_TERMS(5)=3
- DEG(5,1,1) =   2
-COEF(5,1) =        (0.100000000000000D+01, 0.D0)
- DEG(5,2,2) =   2
-COEF(5,2) =        (0.100000000000000D+01, 0.D0)
-COEF(5,3) =       (-0.100000000000000D+01, 0.D0)
-NUM_TERMS(6)=3
- DEG(6,1,3) =   2
-COEF(6,1) =        (0.100000000000000D+01, 0.D0)
- DEG(6,2,4) =   2
-COEF(6,2) =        (0.100000000000000D+01, 0.D0)
-COEF(6,3) =       (-0.100000000000000D+01, 0.D0)
-NUM_TERMS(7)=3
- DEG(7,1,5) =   2
-COEF(7,1) =        (0.100000000000000D+01, 0.D0)
- DEG(7,2,6) =   2
-COEF(7,2) =        (0.100000000000000D+01, 0.D0)
-COEF(7,3) =       (-0.100000000000000D+01, 0.D0)
-NUM_TERMS(8)=3
- DEG(8,1,7) =   2
-COEF(8,1) =        (0.100000000000000D+01, 0.D0)
- DEG(8,2,8) =   2
-COEF(8,2) =        (0.100000000000000D+01, 0.D0)
-COEF(8,3) =       (-0.100000000000000D+01, 0.D0) /
-
-
-&SYSGLPSET ROOT_COUNT_ONLY = .TRUE.
-P(1) = '{{1,2,3,4,5,6,7,8}}'
-P(2) = '{{1,2,3,4,5,6,7,8}}'
-P(3) = '{{1,2,3,4,5,6,7,8}}'
-P(4) = '{{1,2,3,4,5,6,7,8}}'
-P(5) = '{{1,2,3,4,5,6,7,8}}'
-P(6) = '{{1,2,3,4,5,6,7,8}}'
-P(7) = '{{1,2,3,4,5,6,7,8}}'
-P(8) = '{{1,2,3,4,5,6,7,8}}'
-
-DG(1) = '{2}'
-DG(2) = '{2}'
-DG(3) = '{2}'
-DG(4) = '{2}'
-DG(5) = '{2}'
-DG(6) = '{2}'
-DG(7) = '{2}'
-DG(8) = '{2}'
-
-NUM_SETS(1) = 1
-NUM_INDICES(1,1) = 8  SET_DEG(1,1) = 2
-INDEX(1,1,1) = 1 INDEX(1,1,2) = 2 INDEX(1,1,3) = 3 INDEX(1,1,4) = 4
-INDEX(1,1,5) = 5 INDEX(1,1,6) = 6 INDEX(1,1,7) = 7 INDEX(1,1,8) = 8
-
-NUM_SETS(2) = 1
-NUM_INDICES(2,1) = 8  SET_DEG(2,1) = 2
-INDEX(2,1,1) = 1 INDEX(2,1,2) = 2 INDEX(2,1,3) = 3 INDEX(2,1,4) = 4
-INDEX(2,1,5) = 5 INDEX(2,1,6) = 6 INDEX(2,1,7) = 7 INDEX(2,1,8) = 8
-
-NUM_SETS(3) = 1
-NUM_INDICES(3,1) = 8  SET_DEG(3,1) = 2
-INDEX(3,1,1) = 1 INDEX(3,1,2) = 2 INDEX(3,1,3) = 3 INDEX(3,1,4) = 4
-INDEX(3,1,5) = 5 INDEX(3,1,6) = 6 INDEX(3,1,7) = 7 INDEX(3,1,8) = 8
-
-NUM_SETS(4) = 1
-NUM_INDICES(4,1) = 8  SET_DEG(4,1) = 2
-INDEX(4,1,1) = 1 INDEX(4,1,2) = 2 INDEX(4,1,3) = 3 INDEX(4,1,4) = 4
-INDEX(4,1,5) = 5 INDEX(4,1,6) = 6 INDEX(4,1,7) = 7 INDEX(4,1,8) = 8
-
-NUM_SETS(5) = 1
-NUM_INDICES(5,1) = 8  SET_DEG(5,1) = 2
-INDEX(5,1,1) = 1 INDEX(5,1,2) = 2 INDEX(5,1,3) = 3 INDEX(5,1,4) = 4
-INDEX(5,1,5) = 5 INDEX(5,1,6) = 6 INDEX(5,1,7) = 7 INDEX(5,1,8) = 8
-
-NUM_SETS(6) = 1
-NUM_INDICES(6,1) = 8  SET_DEG(6,1) = 2
-INDEX(6,1,1) = 1 INDEX(6,1,2) = 2 INDEX(6,1,3) = 3 INDEX(6,1,4) = 4
-INDEX(6,1,5) = 5 INDEX(6,1,6) = 6 INDEX(6,1,7) = 7 INDEX(6,1,8) = 8
-
-NUM_SETS(7) = 1
-NUM_INDICES(7,1) = 8  SET_DEG(7,1) = 2
-INDEX(7,1,1) = 1 INDEX(7,1,2) = 2 INDEX(7,1,3) = 3 INDEX(7,1,4) = 4
-INDEX(7,1,5) = 5 INDEX(7,1,6) = 6 INDEX(7,1,7) = 7 INDEX(7,1,8) = 8
-
-NUM_SETS(8) = 1
-NUM_INDICES(8,1) = 8  SET_DEG(8,1) = 2
-INDEX(8,1,1) = 1 INDEX(8,1,2) = 2 INDEX(8,1,3) = 3 INDEX(8,1,4) = 4
-INDEX(8,1,5) = 5 INDEX(8,1,6) = 6 INDEX(8,1,7) = 7 INDEX(8,1,8) = 8 /
-
-&PROBLEM  NEW_PROBLEM = .FALSE. /
-
-&SYSGLPSET  ROOT_COUNT_ONLY = .FALSE.
-P(1) = '{{1,2,5,6},{3,4,7,8}}'
-P(2) = '{{1,2,5,6},{3,4,7,8}}'
-P(3) = '{{1,2,5,6},{3,4,7,8}}'
-P(4) = '{{1,2,5,6},{3,4,7,8}}'
-P(5) = '{{1,2,5,6},{3,4,7,8}}'
-P(6) = '{{1,2,5,6},{3,4,7,8}}'
-P(7) = '{{1,2,5,6},{3,4,7,8}}'
-P(8) = '{{1,2,5,6},{3,4,7,8}}'
-
-DG(1) = '{1,1}'
-DG(2) = '{1,1}'
-DG(3) = '{1,1}'
-DG(4) = '{1,1}'
-DG(5) = '{2,0}'
-DG(6) = '{0,2}'
-DG(7) = '{2,0}'
-DG(8) = '{0,2}'
-
-NUM_SETS(1) = 2
-NUM_INDICES(1,1) = 4  SET_DEG(1,1) = 1
-INDEX(1,1,1) = 1  INDEX(1,1,2) = 2  INDEX(1,1,3) = 5  INDEX(1,1,4) = 6
-NUM_INDICES(1,2) = 4  SET_DEG(1,2) = 1
-INDEX(1,2,1) = 3  INDEX(1,2,2) = 4  INDEX(1,2,3) = 7  INDEX(1,2,4) = 8
-
-NUM_SETS(2) = 2
-NUM_INDICES(2,1) = 4  SET_DEG(2,1) = 1
-INDEX(2,1,1) = 1  INDEX(2,1,2) = 2  INDEX(2,1,3) = 5  INDEX(2,1,4) = 6
-NUM_INDICES(2,2) = 4  SET_DEG(2,2) = 1
-INDEX(2,2,1) = 3  INDEX(2,2,2) = 4  INDEX(2,2,3) = 7  INDEX(2,2,4) = 8
-
-NUM_SETS(3) = 2
-NUM_INDICES(3,1) = 4  SET_DEG(3,1) = 1
-INDEX(3,1,1) = 1  INDEX(3,1,2) = 2  INDEX(3,1,3) = 5  INDEX(3,1,4) = 6
-NUM_INDICES(3,2) = 4  SET_DEG(3,2) = 1
-INDEX(3,2,1) = 3  INDEX(3,2,2) = 4  INDEX(3,2,3) = 7  INDEX(3,2,4) = 8
-
-NUM_SETS(4) = 2
-NUM_INDICES(4,1) = 4  SET_DEG(4,1) = 1
-INDEX(4,1,1) = 1  INDEX(4,1,2) = 2  INDEX(4,1,3) = 5  INDEX(4,1,4) = 6
-NUM_INDICES(4,2) = 4  SET_DEG(4,2) = 1
-INDEX(4,2,1) = 3  INDEX(4,2,2) = 4  INDEX(4,2,3) = 7  INDEX(4,2,4) = 8
-
-NUM_SETS(5) = 2
-NUM_INDICES(5,1) = 4  SET_DEG(5,1) = 2
-INDEX(5,1,1) = 1  INDEX(5,1,2) = 2  INDEX(5,1,3) = 5  INDEX(5,1,4) = 6
-NUM_INDICES(5,2) = 4  SET_DEG(5,2) = 0
-INDEX(5,2,1) = 3  INDEX(5,2,2) = 4  INDEX(5,2,3) = 7  INDEX(5,2,4) = 8
-
-NUM_SETS(6) = 2
-NUM_INDICES(6,1) = 4  SET_DEG(6,1) = 0
-INDEX(6,1,1) = 1  INDEX(6,1,2) = 2  INDEX(6,1,3) = 5  INDEX(6,1,4) = 6
-NUM_INDICES(6,2) = 4  SET_DEG(6,2) = 2
-INDEX(6,2,1) = 3  INDEX(6,2,2) = 4  INDEX(6,2,3) = 7  INDEX(6,2,4) = 8
-
-NUM_SETS(7) = 2
-NUM_INDICES(7,1) = 4  SET_DEG(7,1) = 2
-INDEX(7,1,1) = 1  INDEX(7,1,2) = 2  INDEX(7,1,3) = 5  INDEX(7,1,4) = 6
-NUM_INDICES(7,2) = 4  SET_DEG(7,2) = 0
-INDEX(7,2,1) = 3  INDEX(7,2,2) = 4  INDEX(7,2,3) = 7  INDEX(7,2,4) = 8
-
-NUM_SETS(8) = 2
-NUM_INDICES(8,1) = 4  SET_DEG(8,1) = 0
-INDEX(8,1,1) = 1  INDEX(8,1,2) = 2  INDEX(8,1,3) = 5  INDEX(8,1,4) = 6
-NUM_INDICES(8,2) = 4  SET_DEG(8,2) = 2
-INDEX(8,2,1) = 3  INDEX(8,2,2) = 4  INDEX(8,2,3) = 7  INDEX(8,2,4) = 8 /
-
-
-&PROBLEM  NEW_PROBLEM = .TRUE.
-TITLE = ' CS6 DESIGN PROBLEM: FIVE QUADRICS, NO SOLUTIONS AT INFINITY, 26 REAL SOLUTIONS.'
-
-TRACKTOL = 1.0D-04  FINALTOL = 1.0D-14  SINGTOL = 0.0D0  SSPAR(5) = 1.0D0
-NUMRR =  1
-N =  5
-
-DEG=40000*0
-
-NUM_TERMS(1) = 18
-    DEG(1,1,1) = 0
-    DEG(1,1,2) = 0
-    DEG(1,1,3) = 0
-    DEG(1,1,4) = 0
-    DEG(1,1,5) = 0
-  COEF(1,1) = (2.93958190576569E-02,  0.00000000000000E+00)
-    DEG(1,2,1) = 1
-    DEG(1,2,2) = 0
-    DEG(1,2,3) = 0
-    DEG(1,2,4) = 0
-    DEG(1,2,5) = 0
-  COEF(1,2) = (-0.11756935229754306, 0)
-    DEG(1,3,1) = 0
-    DEG(1,3,2) = 1
-    DEG(1,3,3) = 0
-    DEG(1,3,4) = 0
-    DEG(1,3,5) = 0
-  COEF(1,3) = (0.34265841231090866, 0)
-    DEG(1,4,1) = 0
-    DEG(1,4,2) = 0
-    DEG(1,4,3) = 1
-    DEG(1,4,4) = 0
-    DEG(1,4,5) = 0
-  COEF(1,4) = (0.2104179309849071, 0)
-    DEG(1,5,1) = 1
-    DEG(1,5,2) = 0
-    DEG(1,5,3) = 1
-    DEG(1,5,4) = 0
-    DEG(1,5,5) = 0
-  COEF(1,5) = (-0.9038593198794527, 0)
-    DEG(1,6,1) = 0
-    DEG(1,6,2) = 1
-    DEG(1,6,3) = 1
-    DEG(1,6,4) = 0
-    DEG(1,6,5) = 0
-  COEF(1,6) = (1.0327670491132515, 0)
-    DEG(1,7,1) = 0
-    DEG(1,7,2) = 0
-    DEG(1,7,3) = 2
-    DEG(1,7,4) = 0
-    DEG(1,7,5) = 0
-  COEF(1,7) = (0.6088565684448175, 0)
-    DEG(1,8,1) = 0
-    DEG(1,8,2) = 0
-    DEG(1,8,3) = 0
-    DEG(1,8,4) = 1
-    DEG(1,8,5) = 0
-  COEF(1,8) = (-0.03427356382410379, 0)
-    DEG(1,9,1) = 1
-    DEG(1,9,2) = 0
-    DEG(1,9,3) = 0
-    DEG(1,9,4) = 1
-    DEG(1,9,5) = 0
-  COEF(1,9) = (-0.43670032159926, 0)
-    DEG(1,10,1) = 0
-    DEG(1,10,2) = 1
-    DEG(1,10,3) = 0
-    DEG(1,10,4) = 1
-    DEG(1,10,5) = 0
-  COEF(1,10) = (1.7608444687127427, 0)
-    DEG(1,11,1) = 0
-    DEG(1,11,2) = 0
-    DEG(1,11,3) = 1
-    DEG(1,11,4) = 1
-    DEG(1,11,5) = 0
-  COEF(1,11) = (0.01598073819859619, 0)
-    DEG(1,12,1) = 0
-    DEG(1,12,2) = 0
-    DEG(1,12,3) = 0
-    DEG(1,12,4) = 2
-    DEG(1,12,5) = 0
-  COEF(1,12) = (-0.959152095796842, 0)
-    DEG(1,13,1) = 0
-    DEG(1,13,2) = 0
-    DEG(1,13,3) = 0
-    DEG(1,13,4) = 0
-    DEG(1,13,5) = 1
-  COEF(1,13) = (-0.2685772663129975, 0)
-    DEG(1,14,1) = 1
-    DEG(1,14,2) = 0
-    DEG(1,14,3) = 0
-    DEG(1,14,4) = 0
-    DEG(1,14,5) = 1
-  COEF(1,14) = (1.1917984115864249, 0)
-    DEG(1,15,1) = 0
-    DEG(1,15,2) = 1
-    DEG(1,15,3) = 0
-    DEG(1,15,4) = 0
-    DEG(1,15,5) = 1
-  COEF(1,15) = (-1.9462096096076924, 0)
-    DEG(1,16,1) = 0
-    DEG(1,16,2) = 0
-    DEG(1,16,3) = 1
-    DEG(1,16,4) = 0
-    DEG(1,16,5) = 1
-  COEF(1,16) = (-0.9907115020024774, 0)
-    DEG(1,17,1) = 0
-    DEG(1,17,2) = 0
-    DEG(1,17,3) = 0
-    DEG(1,17,4) = 1
-    DEG(1,17,5) = 1
-  COEF(1,17) = (0.43674305066585584, 0)
-    DEG(1,18,1) = 0
-    DEG(1,18,2) = 0
-    DEG(1,18,3) = 0
-    DEG(1,18,4) = 0
-    DEG(1,18,5) = 2
-  COEF(1,18) = (0.35023316405741406, 0)
-
-NUM_TERMS(2) = 18
-    DEG(2,1,1) = 0
-    DEG(2,1,2) = 0
-    DEG(2,1,3) = 0
-    DEG(2,1,4) = 0
-    DEG(2,1,5) = 0
-  COEF(2,1) = (0.19644749775293946, 0)
-    DEG(2,2,1) = 1
-    DEG(2,2,2) = 0
-    DEG(2,2,3) = 0
-    DEG(2,2,4) = 0
-    DEG(2,2,5) = 0
-  COEF(2,2) = (-0.9433670687916758, 0)
-    DEG(2,3,1) = 0
-    DEG(2,3,2) = 1
-    DEG(2,3,3) = 0
-    DEG(2,3,4) = 0
-    DEG(2,3,5) = 0
-  COEF(2,3) = (0.7221679034179772, 0)
-    DEG(2,4,1) = 0
-    DEG(2,4,2) = 0
-    DEG(2,4,3) = 1
-    DEG(2,4,4) = 0
-    DEG(2,4,5) = 0
-  COEF(2,4) = (0.8039009544291977, 0)
-    DEG(2,5,1) = 1
-    DEG(2,5,2) = 0
-    DEG(2,5,3) = 1
-    DEG(2,5,4) = 0
-    DEG(2,5,5) = 0
-  COEF(2,5) = (-0.934872128393953, 0)
-    DEG(2,6,1) = 0
-    DEG(2,6,2) = 1
-    DEG(2,6,3) = 1
-    DEG(2,6,4) = 0
-    DEG(2,6,5) = 0
-  COEF(2,6) = (0.9882433711381574, 0)
-    DEG(2,7,1) = 0
-    DEG(2,7,2) = 0
-    DEG(2,7,3) = 2
-    DEG(2,7,4) = 0
-    DEG(2,7,5) = 0
-  COEF(2,7) = (0.6067776994962018, 0)
-    DEG(2,8,1) = 0
-    DEG(2,8,2) = 0
-    DEG(2,8,3) = 0
-    DEG(2,8,4) = 1
-    DEG(2,8,5) = 0
-  COEF(2,8) = (-0.34310189641798494, 0)
-    DEG(2,9,1) = 1
-    DEG(2,9,2) = 0
-    DEG(2,9,3) = 0
-    DEG(2,9,4) = 1
-    DEG(2,9,5) = 0
-  COEF(2,9) = (-1.3458480997785274, 0)
-    DEG(2,10,1) = 0
-    DEG(2,10,2) = 1
-    DEG(2,10,3) = 0
-    DEG(2,10,4) = 1
-    DEG(2,10,5) = 0
-  COEF(2,10) = (0.3124811174806527, 0)
-    DEG(2,11,1) = 0
-    DEG(2,11,2) = 0
-    DEG(2,11,3) = 1
-    DEG(2,11,4) = 1
-    DEG(2,11,5) = 0
-  COEF(2,11) = (-0.07642591057297893, 0)
-    DEG(2,12,1) = 0
-    DEG(2,12,2) = 0
-    DEG(2,12,3) = 0
-    DEG(2,12,4) = 2
-    DEG(2,12,5) = 0
-  COEF(2,12) = (-0.04714070297636806, 0)
-    DEG(2,13,1) = 0
-    DEG(2,13,2) = 0
-    DEG(2,13,3) = 0
-    DEG(2,13,4) = 0
-    DEG(2,13,5) = 1
-  COEF(2,13) = (-0.14778325391898361, 0)
-    DEG(2,14,1) = 1
-    DEG(2,14,2) = 0
-    DEG(2,14,3) = 0
-    DEG(2,14,4) = 0
-    DEG(2,14,5) = 1
-  COEF(2,14) = (2.462416814841421, 0)
-    DEG(2,15,1) = 0
-    DEG(2,15,2) = 1
-    DEG(2,15,3) = 0
-    DEG(2,15,4) = 0
-    DEG(2,15,5) = 1
-  COEF(2,15) = (-0.7144124594527393, 0)
-    DEG(2,16,1) = 0
-    DEG(2,16,2) = 0
-    DEG(2,16,3) = 1
-    DEG(2,16,4) = 0
-    DEG(2,16,5) = 1
-  COEF(2,16) = (-1.1239227921538322, 0)
-    DEG(2,17,1) = 0
-    DEG(2,17,2) = 0
-    DEG(2,17,3) = 0
-    DEG(2,17,4) = 1
-    DEG(2,17,5) = 1
-  COEF(2,17) = (0.5333458272969541, 0)
-    DEG(2,18,1) = 0
-    DEG(2,18,2) = 0
-    DEG(2,18,3) = 0
-    DEG(2,18,4) = 0
-    DEG(2,18,5) = 2
-  COEF(2,18) = (-0.5596367446159262, 0)
-
-NUM_TERMS(3) = 18
-    DEG(3,1,1) = 0
-    DEG(3,1,2) = 0
-    DEG(3,1,3) = 0
-    DEG(3,1,4) = 0
-    DEG(3,1,5) = 0
-  COEF(3,1) = (1.5879652434406093, 0)
-    DEG(3,2,1) = 1
-    DEG(3,2,2) = 0
-    DEG(3,2,3) = 0
-    DEG(3,2,4) = 0
-    DEG(3,2,5) = 0
-  COEF(3,2) = (-4.043830202732928, 0)
-    DEG(3,3,1) = 0
-    DEG(3,3,2) = 1
-    DEG(3,3,3) = 0
-    DEG(3,3,4) = 0
-    DEG(3,3,5) = 0
-  COEF(3,3) = (0.5152428036546656, 0)
-    DEG(3,4,1) = 0
-    DEG(3,4,2) = 0
-    DEG(3,4,3) = 1
-    DEG(3,4,4) = 0
-    DEG(3,4,5) = 0
-  COEF(3,4) = (-1.9078459367439762, 0)
-    DEG(3,5,1) = 1
-    DEG(3,5,2) = 0
-    DEG(3,5,3) = 1
-    DEG(3,5,4) = 0
-    DEG(3,5,5) = 0
-  COEF(3,5) = (4.649065771357426, 0)
-    DEG(3,6,1) = 0
-    DEG(3,6,2) = 1
-    DEG(3,6,3) = 1
-    DEG(3,6,4) = 0
-    DEG(3,6,5) = 0
-  COEF(3,6) = (0.8804108942539046, 0)
-    DEG(3,7,1) = 0
-    DEG(3,7,2) = 0
-    DEG(3,7,3) = 2
-    DEG(3,7,4) = 0
-    DEG(3,7,5) = 0
-  COEF(3,7) = (0.5505387330147733, 0)
-    DEG(3,8,1) = 0
-    DEG(3,8,2) = 0
-    DEG(3,8,3) = 0
-    DEG(3,8,4) = 1
-    DEG(3,8,5) = 0
-  COEF(3,8) = (-1.2398168002864893, 0)
-    DEG(3,9,1) = 1
-    DEG(3,9,2) = 0
-    DEG(3,9,3) = 0
-    DEG(3,9,4) = 1
-    DEG(3,9,5) = 0
-  COEF(3,9) = (1.2949470158832361, 0)
-    DEG(3,10,1) = 0
-    DEG(3,10,2) = 1
-    DEG(3,10,3) = 0
-    DEG(3,10,4) = 1
-    DEG(3,10,5) = 0
-  COEF(3,10) = (0.2634910888040112, 0)
-    DEG(3,11,1) = 0
-    DEG(3,11,2) = 0
-    DEG(3,11,3) = 1
-    DEG(3,11,4) = 1
-    DEG(3,11,5) = 0
-  COEF(3,11) = (-0.3083664760078296, 0)
-    DEG(3,12,1) = 0
-    DEG(3,12,2) = 0
-    DEG(3,12,3) = 0
-    DEG(3,12,4) = 2
-    DEG(3,12,5) = 0
-  COEF(3,12) = (-0.14640083595004463, 0)
-    DEG(3,13,1) = 0
-    DEG(3,13,2) = 0
-    DEG(3,13,3) = 0
-    DEG(3,13,4) = 0
-    DEG(3,13,5) = 1
-  COEF(3,13) = (-1.083760397548215, 0)
-    DEG(3,14,1) = 1
-    DEG(3,14,2) = 0
-    DEG(3,14,3) = 0
-    DEG(3,14,4) = 0
-    DEG(3,14,5) = 1
-  COEF(3,14) = (3.8533075966131336, 0)
-    DEG(3,15,1) = 0
-    DEG(3,15,2) = 1
-    DEG(3,15,3) = 0
-    DEG(3,15,4) = 0
-    DEG(3,15,5) = 1
-  COEF(3,15) = (-0.7480600149021419, 0)
-    DEG(3,16,1) = 0
-    DEG(3,16,2) = 0
-    DEG(3,16,3) = 1
-    DEG(3,16,4) = 0
-    DEG(3,16,5) = 1
-  COEF(3,16) = (-0.5233060105983979, 0)
-    DEG(3,17,1) = 0
-    DEG(3,17,2) = 0
-    DEG(3,17,3) = 0
-    DEG(3,17,4) = 1
-    DEG(3,17,5) = 1
-  COEF(3,17) = (0.779442735747407, 0)
-    DEG(3,18,1) = 0
-    DEG(3,18,2) = 0
-    DEG(3,18,3) = 0
-    DEG(3,18,4) = 0
-    DEG(3,18,5) = 2
-  COEF(3,18) = (-0.404203561997207, 0)
-
-NUM_TERMS(4) = 18
-    DEG(4,1,1) = 0
-    DEG(4,1,2) = 0
-    DEG(4,1,3) = 0
-    DEG(4,1,4) = 0
-    DEG(4,1,5) = 0
-  COEF(4,1) = (3.5514657636879297, 0)
-    DEG(4,2,1) = 1
-    DEG(4,2,2) = 0
-    DEG(4,2,3) = 0
-    DEG(4,2,4) = 0
-    DEG(4,2,5) = 0
-  COEF(4,2) = (-2.469699071786025, 0)
-    DEG(4,3,1) = 0
-    DEG(4,3,2) = 1
-    DEG(4,3,3) = 0
-    DEG(4,3,4) = 0
-    DEG(4,3,5) = 0
-  COEF(4,3) = (3.5944613369407525, 0)
-    DEG(4,4,1) = 0
-    DEG(4,4,2) = 0
-    DEG(4,4,3) = 1
-    DEG(4,4,4) = 0
-    DEG(4,4,5) = 0
-  COEF(4,4) = (0.6207583746920333, 0)
-    DEG(4,5,1) = 1
-    DEG(4,5,2) = 0
-    DEG(4,5,3) = 1
-    DEG(4,5,4) = 0
-    DEG(4,5,5) = 0
-  COEF(4,5) = (0.2797499732075579, 0)
-    DEG(4,6,1) = 0
-    DEG(4,6,2) = 1
-    DEG(4,6,3) = 1
-    DEG(4,6,4) = 0
-    DEG(4,6,5) = 0
-  COEF(4,6) = (-0.014921233506722642, 0)
-    DEG(4,7,1) = 0
-    DEG(4,7,2) = 0
-    DEG(4,7,3) = 2
-    DEG(4,7,4) = 0
-    DEG(4,7,5) = 0
-  COEF(4,7) = (-0.09983493316614078, 0)
-    DEG(4,8,1) = 0
-    DEG(4,8,2) = 0
-    DEG(4,8,3) = 0
-    DEG(4,8,4) = 1
-    DEG(4,8,5) = 0
-  COEF(4,8) = (3.422269093581984, 0)
-    DEG(4,9,1) = 1
-    DEG(4,9,2) = 0
-    DEG(4,9,3) = 0
-    DEG(4,9,4) = 1
-    DEG(4,9,5) = 0
-  COEF(4,9) = (-1.9461829809657172, 0)
-    DEG(4,10,1) = 0
-    DEG(4,10,2) = 1
-    DEG(4,10,3) = 0
-    DEG(4,10,4) = 1
-    DEG(4,10,5) = 0
-  COEF(4,10) = (3.566435520069538, 0)
-    DEG(4,11,1) = 0
-    DEG(4,11,2) = 0
-    DEG(4,11,3) = 1
-    DEG(4,11,4) = 1
-    DEG(4,11,5) = 0
-  COEF(4,11) = (0.4469779351319699, 0)
-    DEG(4,12,1) = 0
-    DEG(4,12,2) = 0
-    DEG(4,12,3) = 0
-    DEG(4,12,4) = 2
-    DEG(4,12,5) = 0
-  COEF(4,12) = (-0.10468816274735565, 0)
-    DEG(4,13,1) = 0
-    DEG(4,13,2) = 0
-    DEG(4,13,3) = 0
-    DEG(4,13,4) = 0
-    DEG(4,13,5) = 1
-  COEF(4,13) = (-1.4525020166772122, 0)
-    DEG(4,14,1) = 1
-    DEG(4,14,2) = 0
-    DEG(4,14,3) = 0
-    DEG(4,14,4) = 0
-    DEG(4,14,5) = 1
-  COEF(4,14) = (0.6164313155570404, 0)
-    DEG(4,15,1) = 0
-    DEG(4,15,2) = 1
-    DEG(4,15,3) = 0
-    DEG(4,15,4) = 0
-    DEG(4,15,5) = 1
-  COEF(4,15) = (-1.4995015340202302, 0)
-    DEG(4,16,1) = 0
-    DEG(4,16,2) = 0
-    DEG(4,16,3) = 1
-    DEG(4,16,4) = 0
-    DEG(4,16,5) = 1
-  COEF(4,16) = (-0.25710982353187295, 0)
-    DEG(4,17,1) = 0
-    DEG(4,17,2) = 0
-    DEG(4,17,3) = 0
-    DEG(4,17,4) = 1
-    DEG(4,17,5) = 1
-  COEF(4,17) = (-0.18964007362709373, 0)
-    DEG(4,18,1) = 0
-    DEG(4,18,2) = 0
-    DEG(4,18,3) = 0
-    DEG(4,18,4) = 0
-    DEG(4,18,5) = 2
-  COEF(4,18) = (0.20461226941852928, 0)
-
-NUM_TERMS(5) = 18
-    DEG(5,1,1) = 0
-    DEG(5,1,2) = 0
-    DEG(5,1,3) = 0
-    DEG(5,1,4) = 0
-    DEG(5,1,5) = 0
-  COEF(5,1) = (2.0829222105891896, 0)
-    DEG(5,2,1) = 1
-    DEG(5,2,2) = 0
-    DEG(5,2,3) = 0
-    DEG(5,2,4) = 0
-    DEG(5,2,5) = 0
-  COEF(5,2) = (-2.5100312789732357, 0)
-    DEG(5,3,1) = 0
-    DEG(5,3,2) = 1
-    DEG(5,3,3) = 0
-    DEG(5,3,4) = 0
-    DEG(5,3,5) = 0
-  COEF(5,3) = (-2.29569320905875, 0)
-    DEG(5,4,1) = 0
-    DEG(5,4,2) = 0
-    DEG(5,4,3) = 1
-    DEG(5,4,4) = 0
-    DEG(5,4,5) = 0
-  COEF(5,4) = (0.635740520517206, 0)
-    DEG(5,5,1) = 1
-    DEG(5,5,2) = 0
-    DEG(5,5,3) = 1
-    DEG(5,5,4) = 0
-    DEG(5,5,5) = 0
-  COEF(5,5) = (0.2789274113265512, 0)
-    DEG(5,6,1) = 0
-    DEG(5,6,2) = 1
-    DEG(5,6,3) = 1
-    DEG(5,6,4) = 0
-    DEG(5,6,5) = 0
-  COEF(5,6) = (0.2567585931687416, 0)
-    DEG(5,7,1) = 0
-    DEG(5,7,2) = 0
-    DEG(5,7,3) = 2
-    DEG(5,7,4) = 0
-    DEG(5,7,5) = 0
-  COEF(5,7) = (-0.09646100170101732, 0)
-    DEG(5,8,1) = 0
-    DEG(5,8,2) = 0
-    DEG(5,8,3) = 0
-    DEG(5,8,4) = 1
-    DEG(5,8,5) = 0
-  COEF(5,8) = (2.4154551097403476, 0)
-    DEG(5,9,1) = 1
-    DEG(5,9,2) = 0
-    DEG(5,9,3) = 0
-    DEG(5,9,4) = 1
-    DEG(5,9,5) = 0
-  COEF(5,9) = (0.011721362270430358, 0)
-    DEG(5,10,1) = 0
-    DEG(5,10,2) = 1
-    DEG(5,10,3) = 0
-    DEG(5,10,4) = 1
-    DEG(5,10,5) = 0
-  COEF(5,10) = (0.003238475932803412, 0)
-    DEG(5,11,1) = 0
-    DEG(5,11,2) = 0
-    DEG(5,11,3) = 1
-    DEG(5,11,4) = 1
-    DEG(5,11,5) = 0
-  COEF(5,11) = (-0.2747715233380663, 0)
-    DEG(5,12,1) = 0
-    DEG(5,12,2) = 0
-    DEG(5,12,3) = 0
-    DEG(5,12,4) = 2
-    DEG(5,12,5) = 0
-  COEF(5,12) = (-0.003868367196580862, 0)
-    DEG(5,13,1) = 0
-    DEG(5,13,2) = 0
-    DEG(5,13,3) = 0
-    DEG(5,13,4) = 0
-    DEG(5,13,5) = 1
-  COEF(5,13) = (1.4468367425412896, 0)
-    DEG(5,14,1) = 1
-    DEG(5,14,2) = 0
-    DEG(5,14,3) = 0
-    DEG(5,14,4) = 0
-    DEG(5,14,5) = 1
-  COEF(5,14) = (-0.1969200146335218, 0)
-    DEG(5,15,1) = 0
-    DEG(5,15,2) = 1
-    DEG(5,15,3) = 0
-    DEG(5,15,4) = 0
-    DEG(5,15,5) = 1
-  COEF(5,15) = (-0.18708210276840792, 0)
-    DEG(5,16,1) = 0
-    DEG(5,16,2) = 0
-    DEG(5,16,3) = 1
-    DEG(5,16,4) = 0
-    DEG(5,16,5) = 1
-  COEF(5,16) = (-0.07412252953384652, 0)
-    DEG(5,17,1) = 0
-    DEG(5,17,2) = 0
-    DEG(5,17,3) = 0
-    DEG(5,17,4) = 1
-    DEG(5,17,5) = 1
-  COEF(5,17) = (0.1909028657204965, 0)
-    DEG(5,18,1) = 0
-    DEG(5,18,2) = 0
-    DEG(5,18,3) = 0
-    DEG(5,18,4) = 0
-    DEG(5,18,5) = 2
-  COEF(5,18) = (0.10038925602902535, 0) /
-
-&SYSGLPSET ROOT_COUNT_ONLY = .FALSE.
-
-P(1) = '{{u, v, x, y, z}, {x, y, z}}'
-P(2) = '{{u, v, x, y, z}, {x, y, z}}'
-P(3) = '{{u, v, x, y, z}, {x, y, z}}'
-P(4) = '{{u, v, x, y, z}, {x, y, z}}'
-P(5) = '{{u, v, x, y, z}, {x, y, z}}'
-
-DG(1) = '{1, 1}'
-DG(2) = '{1, 1}'
-DG(3) = '{1, 1}'
-DG(4) = '{1, 1}'
-DG(5) = '{1, 1}'
-
-NUM_SETS(1) = 2
-  NUM_INDICES(1,1) = 5  SET_DEG(1,1) = 1
-    INDEX(1,1,1) = 1
-    INDEX(1,1,2) = 2
-    INDEX(1,1,3) = 3
-    INDEX(1,1,4) = 4
-    INDEX(1,1,5) = 5
-  NUM_INDICES(1,2) = 3  SET_DEG(1,2) = 1
-    INDEX(1,2,1) = 3
-    INDEX(1,2,2) = 4
-    INDEX(1,2,3) = 5
-NUM_SETS(2) = 2
-  NUM_INDICES(2,1) = 5  SET_DEG(2,1) = 1
-    INDEX(2,1,1) = 1
-    INDEX(2,1,2) = 2
-    INDEX(2,1,3) = 3
-    INDEX(2,1,4) = 4
-    INDEX(2,1,5) = 5
-  NUM_INDICES(2,2) = 3  SET_DEG(2,2) = 1
-    INDEX(2,2,1) = 3
-    INDEX(2,2,2) = 4
-    INDEX(2,2,3) = 5
-NUM_SETS(3) = 2
-  NUM_INDICES(3,1) = 5  SET_DEG(3,1) = 1
-    INDEX(3,1,1) = 1
-    INDEX(3,1,2) = 2
-    INDEX(3,1,3) = 3
-    INDEX(3,1,4) = 4
-    INDEX(3,1,5) = 5
-  NUM_INDICES(3,2) = 3  SET_DEG(3,2) = 1
-    INDEX(3,2,1) = 3
-    INDEX(3,2,2) = 4
-    INDEX(3,2,3) = 5
-NUM_SETS(4) = 2
-  NUM_INDICES(4,1) = 5  SET_DEG(4,1) = 1
-    INDEX(4,1,1) = 1
-    INDEX(4,1,2) = 2
-    INDEX(4,1,3) = 3
-    INDEX(4,1,4) = 4
-    INDEX(4,1,5) = 5
-  NUM_INDICES(4,2) = 3  SET_DEG(4,2) = 1
-    INDEX(4,2,1) = 3
-    INDEX(4,2,2) = 4
-    INDEX(4,2,3) = 5
-NUM_SETS(5) = 2
-  NUM_INDICES(5,1) = 5  SET_DEG(5,1) = 1
-    INDEX(5,1,1) = 1
-    INDEX(5,1,2) = 2
-    INDEX(5,1,3) = 3
-    INDEX(5,1,4) = 4
-    INDEX(5,1,5) = 5
-  NUM_INDICES(5,2) = 3  SET_DEG(5,2) = 1
-    INDEX(5,2,1) = 3
-    INDEX(5,2,2) = 4
-    INDEX(5,2,3) = 5 /
-
diff --git a/sandbox/857/OUTPUT.DAT b/sandbox/857/OUTPUT.DAT
deleted file mode 100644
index adad639..0000000
--- a/sandbox/857/OUTPUT.DAT
+++ /dev/null
@@ -1,2372 +0,0 @@
-TWO QUADRICS, NO SOLUTIONS AT INFINITY, TWO REAL SOLUTIONS.
-
-TRACKTOL, FINALTOL =  1.00000000000000E-04  1.00000000000000E-14
-SINGTOL (0 SETS DEFAULT) =  1.49011611938477E-08
-SSPAR(5) (0 SETS DEFAULT) =  1.00000000000000E+00
-NUMBER OF EQUATIONS =  2
-
-===== PROCESSOR    1 TRACKED      0 PATHS IN    5.564E-01 secs =====
-
-===== PROCESSOR    2 TRACKED      4 PATHS IN    7.894E-01 secs =====
-
-PATH NUMBER =         1
-
-ARCLEN =  1.36185340905372E+00
-NFE =   66
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.61697151794133E-19
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.61478579234358E-02,  1.68496955498881E+00)
-X( 2) = (  2.67994739614461E-04,  4.42802993973661E-03)
-
-X( 3) = (  1.06966851098793E-01, -1.97423106050505E-01)
-
-PATH NUMBER =         2
-
-ARCLEN =  3.28710957507431E+00
-NFE =   80
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.13803423864229E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.61478579234711E-02, -1.68496955498883E+00)
-X( 2) = (  2.67994739614548E-04, -4.42802993973660E-03)
-
-X( 3) = (  7.12683671765457E-02, -2.39520076871927E-01)
-
-PATH NUMBER =         3
-
-ARCLEN =  2.91008651160030E+00
-NFE =  101
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.99104350392831E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  2.34233851959126E+03, -1.15125998087115E-11)
-X( 2) = ( -7.88344824094134E-01,  4.20140059808482E-15)
-
-X( 3) = (  2.67722438676427E-04, -3.76056201794181E-03)
-
-PATH NUMBER =         4
-
-ARCLEN =  1.20979816868429E+00
-NFE =   49
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.48474051115203E-16
-FINITE REAL SOLUTION
-
-X( 1) = (  9.08921229615498E-02,  1.55861063674267E-14)
-X( 2) = ( -9.11497098197497E-02,  6.71625008977080E-18)
-
-X( 3) = (  4.21854410076983E-03, -6.11210648523702E-02)
-
-=========Number of processors used:      2  ========
-Bezout GLP number (BGLP)          :      4
-Number of finite solutions        :      4
-Number of finite real solutions   :      2
-Number of finite complex solutions:      2
-Number of solutions at infinity   :      0
-Number of homotopy path failures  :      0
-Maximum running time              :   7.894E-01 secs
-====================================================
-
-
-
-PB803, 48 FINITE SOLUTIONS, TOTAL DEGREE 256.
-
-TRACKTOL, FINALTOL =  1.00000000000000E-07  1.00000000000000E-12
-SINGTOL (0 SETS DEFAULT) =  1.49011611938477E-08
-SSPAR(5) (0 SETS DEFAULT) =  1.00000000000000E+00
-NUMBER OF EQUATIONS =  8
-
-============================================================
-Bezout GLP number (BGLP) =     256 for the system covering:
-P( 1) = {{1,2,3,4,5,6,7,8}},   DG( 1) = {2}
-P( 2) = {{1,2,3,4,5,6,7,8}},   DG( 2) = {2}
-P( 3) = {{1,2,3,4,5,6,7,8}},   DG( 3) = {2}
-P( 4) = {{1,2,3,4,5,6,7,8}},   DG( 4) = {2}
-P( 5) = {{1,2,3,4,5,6,7,8}},   DG( 5) = {2}
-P( 6) = {{1,2,3,4,5,6,7,8}},   DG( 6) = {2}
-P( 7) = {{1,2,3,4,5,6,7,8}},   DG( 7) = {2}
-P( 8) = {{1,2,3,4,5,6,7,8}},   DG( 8) = {2}
-============================================================
-
-===== PROCESSOR    1 TRACKED      0 PATHS IN    7.161E+00 secs =====
-
-===== PROCESSOR    2 TRACKED     96 PATHS IN    7.161E+00 secs =====
-
-PATH NUMBER =         1
-
-ARCLEN =  9.13606057966973E+00
-NFE =  173
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.43271314758696E-13
-SOLUTION AT INFINITY
-
-X( 1) = (  6.80381551817444E+13, -2.43839810278811E+14)
-X( 2) = ( -2.43839810278811E+14, -6.80381551817436E+13)
-X( 3) = ( -3.85755840316068E-01,  2.49656553581811E-01)
-X( 4) = (  7.13213883731995E-01, -1.61463098420777E+00)
-X( 5) = ( -1.63825094988875E+00, -4.47150037683053E+00)
-X( 6) = ( -1.46122258579254E+00,  1.24860323779058E+00)
-X( 7) = ( -1.57409875360699E+14,  7.42860448073245E+13)
-X( 8) = ( -7.42860448073233E+13, -1.57409875360698E+14)
-
-X( 9) = (  1.77635683940025E-15, -3.33066907387547E-16)
-
-PATH NUMBER =         2
-
-ARCLEN =  2.53566306687520E+01
-NFE =  198
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.97311434608420E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -1.29626865906870E-01,  1.85405888581041E-01)
-X( 2) = (  1.00902900917828E+00,  2.38185265624947E-02)
-X( 3) = ( -5.06099762670920E-01, -1.97612071536565E+00)
-X( 4) = ( -2.20339260732315E+00,  4.53897422425624E-01)
-X( 5) = ( -1.25562726235550E+00,  4.31546989109985E-02)
-X( 6) = ( -7.11621633744503E-02, -7.61447008943104E-01)
-X( 7) = (  2.34519131484149E-01,  1.86661190037685E+00)
-X( 8) = (  2.11473191547314E+00, -2.07003165976442E-01)
-
-X( 9) = ( -6.30015049232402E-02, -1.84039105194187E-01)
-
-PATH NUMBER =         3
-
-ARCLEN =  5.46423510155191E+01
-NFE =  204
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.55697798966522E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -5.73993644466773E-01,  2.63874515550241E-01)
-X( 2) = ( -8.77471389081320E-01, -1.72612231859961E-01)
-X( 3) = ( -3.06129886067411E-01, -1.27633565998052E-01)
-X( 4) = (  9.61367068432931E-01, -4.06425914724242E-02)
-X( 5) = (  1.06286154111227E+00, -3.09983707316465E-02)
-X( 6) = ( -8.91250080067848E-02, -3.69671507746724E-01)
-X( 7) = (  5.35586935983244E-01, -3.55587300380933E-02)
-X( 8) = ( -8.45528470021298E-01, -2.25241277423546E-02)
-
-X( 9) = ( -1.83385523467425E-01,  6.78005855481417E-01)
-
-PATH NUMBER =         4
-
-ARCLEN =  2.80679503330526E+01
-NFE =  229
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.98318282210833E-17
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.28253379807929E-01,  5.66208311141466E-01)
-X( 2) = ( -9.39953195542937E-01, -4.98922658704698E-01)
-X( 3) = ( -2.88293160145086E-01, -1.92429259310047E-01)
-X( 4) = (  9.78330979423582E-01, -5.67047762338647E-02)
-X( 5) = (  1.28667055008929E+00,  7.48750669668242E-02)
-X( 6) = (  1.18237411569355E-01, -8.14797468275645E-01)
-X( 7) = (  4.88755859727676E-01,  1.68192955396115E-01)
-X( 8) = ( -8.93239162923568E-01,  9.20305511971840E-02)
-
-X( 9) = ( -3.27833459169782E-01,  6.46075402365124E-01)
-
-PATH NUMBER =         5
-
-ARCLEN =  1.61662387301381E+01
-NFE =  179
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.95472552584235E-15
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.45196877409835E-01,  7.92235415426033E-01)
-X( 2) = (  1.12566385494451E+00,  5.94844452320605E-01)
-X( 3) = ( -3.54281084626980E-01,  8.41957515842745E-02)
-X( 4) = ( -9.39458343171760E-01, -3.17512345375017E-02)
-X( 5) = ( -1.16156403958416E+00,  1.51629198529728E+00)
-X( 6) = (  1.72860198938116E+00,  1.01889865593729E+00)
-X( 7) = ( -9.87295286067431E-01, -5.58588121492163E-03)
-X( 8) = ( -1.62572967705491E-01,  3.39227011099120E-02)
-
-X( 9) = ( -2.80181151606441E-01, -1.64821705740168E-01)
-
-PATH NUMBER =         6
-
-ARCLEN =  9.68230073640123E+00
-NFE =  149
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.13651870392486E-16
-SOLUTION AT INFINITY
-
-X( 1) = (  2.37131333300544E+15,  2.45482172848729E+15)
-X( 2) = (  2.45482172848729E+15, -2.37131333300544E+15)
-X( 3) = (  2.31136737243521E-01,  8.52707152263258E-01)
-X( 4) = ( -1.11665891355403E+00,  7.87387695454767E-01)
-X( 5) = ( -2.59629898479234E+15,  2.74098838372984E+15)
-X( 6) = ( -2.74098838372984E+15, -2.59629898479234E+15)
-X( 7) = ( -1.68659034684383E-01, -1.09756144540822E+00)
-X( 8) = ( -1.28166184135222E+00,  5.23183775411596E-01)
-
-X( 9) = ( -1.11022302462516E-16, -5.55111512312578E-17)
-
-PATH NUMBER =         7
-
-ARCLEN =  3.13309632064515E+01
-NFE =  213
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.58439218873134E-18
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.08707913283362E+00, -1.12206976693261E-01)
-X( 2) = (  2.52695630148077E-01,  4.82706657214905E-01)
-X( 3) = ( -7.60926702188130E-01, -3.00226576434988E-01)
-X( 4) = (  7.73530340563732E-01, -2.95334787449214E-01)
-X( 5) = (  1.11306763775108E+00,  1.06662124290859E-01)
-X( 6) = ( -2.25085865185255E-01,  5.27452750639071E-01)
-X( 7) = (  5.60758078600111E-01,  2.75952812846165E-01)
-X( 8) = ( -8.89908277794076E-01,  1.73886200384034E-01)
-
-X( 9) = ( -1.45918965623376E+00,  8.33193214818760E-01)
-
-PATH NUMBER =         8
-
-ARCLEN =  2.58017199813490E+01
-NFE =  161
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.24653276558605E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  2.29357256355386E-01,  3.95792191765621E-16)
-X( 2) = (  9.73342308212855E-01,  4.88383465522657E-16)
-X( 3) = (  2.39309340396266E-01, -8.53755103130107E-16)
-X( 4) = ( -9.70943376103417E-01,  1.09841666963192E-16)
-X( 5) = ( -9.93991529928233E-01, -1.94231758180407E-16)
-X( 6) = (  1.09457016362260E-01, -4.96475539062022E-16)
-X( 7) = ( -1.30933055767338E-01,  8.82306278013190E-16)
-X( 8) = (  9.91391211836893E-01,  0.00000000000000E+00)
-
-X( 9) = ( -2.77190323576739E-01, -2.26971110442786E-01)
-
-PATH NUMBER =         9
-
-ARCLEN =  1.12884548460318E+01
-NFE =  116
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.59283685783963E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -3.59213282135405E-01,  1.75620811047262E-01)
-X( 2) = (  9.51945474476282E-01,  6.62698963743434E-02)
-X( 3) = (  1.07619680311176E+00, -3.86550605399061E-02)
-X( 4) = ( -1.01778566379970E-01, -4.08734904182388E-01)
-X( 5) = ( -1.33456507217685E+00, -6.81624099524745E-01)
-X( 6) = (  8.74702052835707E-01, -1.03997894212166E+00)
-X( 7) = ( -1.07398005488249E+00, -6.47210247186716E-02)
-X( 8) = ( -1.65402932515428E-01,  4.20240975309955E-01)
-
-X( 9) = ( -2.30636697435997E-01,  7.24340141606627E-02)
-
-PATH NUMBER =        10
-
-ARCLEN =  5.01072777430774E+00
-NFE =  104
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.63411120562404E-17
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.40062525275419E-01, -3.31061653116358E-01)
-X( 2) = (  7.38680181298249E-01, -3.76499187848784E-01)
-X( 3) = (  5.17100724931635E-01, -3.88067038518990E+00)
-X( 4) = (  4.00539746007343E+00,  5.00998337719431E-01)
-X( 5) = ( -1.65699648586207E+00,  5.82716504385742E-02)
-X( 6) = ( -7.30400050240809E-02, -1.32195938335803E+00)
-X( 7) = (  3.73775710005446E+00, -7.06361391302762E-01)
-X( 8) = ( -7.32043054625678E-01, -3.60662844741596E+00)
-
-X( 9) = ( -1.15638791681373E-02,  9.79958036298178E-02)
-
-PATH NUMBER =        11
-
-ARCLEN =  8.66219751383449E+00
-NFE =  111
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.98466109616297E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  8.86905474091763E-01, -1.35624581044991E-17)
-X( 2) = (  4.61950949805351E-01, -6.34544801263536E-16)
-X( 3) = (  6.98952745885602E-01, -6.46696022042494E-16)
-X( 4) = (  7.15167853737133E-01,  6.56330404265007E-16)
-X( 5) = ( -1.60239444861386E-02,  9.66761283012070E-16)
-X( 6) = ( -9.99871608359346E-01,  1.35280402477795E-16)
-X( 7) = ( -6.88217284181033E-01,  3.40128543521738E-16)
-X( 8) = ( -7.25504631104779E-01, -7.91469342794128E-16)
-
-X( 9) = ( -4.48223024048880E-01,  3.14464829292636E-02)
-
-PATH NUMBER =        12
-
-ARCLEN =  4.55905949404097E+00
-NFE =  110
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.59228537247309E-17
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  9.51044815428272E-01,  3.30314788813078E-03)
-X( 2) = ( -3.09237559760445E-01,  1.01586679057787E-02)
-X( 3) = ( -1.67483475490118E-01,  4.01571993917387E-02)
-X( 4) = (  9.86715940318371E-01,  6.81621431787935E-03)
-X( 5) = (  3.58070010433482E-01, -1.34366160073985E-01)
-X( 6) = ( -9.44687224087698E-01, -5.09295469577903E-02)
-X( 7) = (  8.88159812042096E-01,  2.54383575921024E-02)
-X( 8) = ( -4.62819970372660E-01,  4.88166638087578E-02)
-
-X( 9) = ( -5.05871049829429E-01,  1.04673030313557E+00)
-
-PATH NUMBER =        13
-
-ARCLEN =  7.24428217242840E+00
-NFE =  116
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.53728485690893E-18
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -1.17580884606015E+00,  3.91945730962369E-01)
-X( 2) = (  6.00333423168922E-01,  7.67662168813461E-01)
-X( 3) = ( -4.46316901221626E-01, -4.48073453470398E-02)
-X( 4) = ( -8.96273829690172E-01,  2.23126848790967E-02)
-X( 5) = ( -1.71041655462014E+00, -8.19910369153664E-01)
-X( 6) = (  9.53617690809595E-01, -1.47059799982795E+00)
-X( 7) = ( -9.69616408977201E-01, -9.02774498392340E-03)
-X( 8) = ( -2.47341824528349E-01,  3.53900909769930E-02)
-
-X( 9) = ( -3.12419935955110E-01,  7.18080523551173E-02)
-
-PATH NUMBER =        14
-
-ARCLEN =  8.21305500088893E+00
-NFE =  132
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.31552117684884E-13
-SOLUTION AT INFINITY
-
-X( 1) = (  4.08783257443532E+13, -5.24471763064416E+13)
-X( 2) = (  5.24471763064413E+13,  4.08783257443535E+13)
-X( 3) = (  6.01637359369485E-01, -6.59682038074212E-01)
-X( 4) = (  3.06306684509433E-01, -4.92285535593589E+00)
-X( 5) = ( -8.87552595528511E+00,  9.91031587146599E+00)
-X( 6) = ( -2.36847638015134E+00, -3.27917154881309E+00)
-X( 7) = (  1.00868630422870E+14,  1.74890939572516E+13)
-X( 8) = (  1.74890939572517E+13, -1.00868630422870E+14)
-
-X( 9) = (  2.44249065417534E-15,  3.10862446895044E-15)
-
-PATH NUMBER =        15
-
-ARCLEN =  1.28905115998394E+01
-NFE =  130
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.65964139341548E-15
-SOLUTION AT INFINITY
-
-X( 1) = ( -2.80208515501757E+14, -1.09860720793748E+15)
-X( 2) = (  1.09860720793748E+15, -2.80208515501757E+14)
-X( 3) = ( -2.29450375323549E-01, -9.03313588263499E-01)
-X( 4) = ( -1.40005422194306E+00,  5.85497991632654E-02)
-X( 5) = ( -1.59287688443574E+15, -7.83275419294841E+14)
-X( 6) = ( -7.83275419294841E+14,  1.59287688443574E+15)
-X( 7) = ( -1.10476574672730E+00, -1.69640425576146E-01)
-X( 8) = ( -3.94481215557609E-01,  1.34603037918522E-01)
-
-X( 9) = ( -1.11022302462516E-15, -5.55111512312578E-17)
-
-PATH NUMBER =        16
-
-ARCLEN =  1.34529007254483E+01
-NFE =  180
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.75084468215756E-17
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  6.17653599891829E-01,  6.36907669143172E-02)
-X( 2) = ( -7.90592480178201E-01,  4.97586714404774E-02)
-X( 3) = ( -8.96723890425260E-01,  6.96526650740099E-02)
-X( 4) = (  4.67530808227781E-01,  1.33593781852390E-01)
-X( 5) = (  4.08955073213484E-01,  5.09587694769521E-01)
-X( 6) = ( -1.06340978278925E+00,  1.95971935180570E-01)
-X( 7) = (  9.07104450970909E-01, -9.39529209909667E-02)
-X( 8) = ( -4.68117719657311E-01, -1.82059147162842E-01)
-
-X( 9) = (  4.92585934948594E-01, -1.85513425019886E+00)
-
-PATH NUMBER =        17
-
-ARCLEN =  5.42181266723411E+00
-NFE =  140
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.75256211970155E-15
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.28253379807929E-01, -5.66208311141458E-01)
-X( 2) = ( -9.39953195542929E-01,  4.98922658704695E-01)
-X( 3) = ( -2.88293160145085E-01,  1.92429259310046E-01)
-X( 4) = (  9.78330979423583E-01,  5.67047762338632E-02)
-X( 5) = (  1.28667055008928E+00, -7.48750669668270E-02)
-X( 6) = (  1.18237411569360E-01,  8.14797468275635E-01)
-X( 7) = (  4.88755859727674E-01, -1.68192955396113E-01)
-X( 8) = ( -8.93239162923569E-01, -9.20305511971819E-02)
-
-X( 9) = (  2.14599608588855E-01,  3.89439156341545E-01)
-
-PATH NUMBER =        18
-
-ARCLEN =  2.05978621130940E+01
-NFE =  208
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.74117405491778E-15
-SOLUTION AT INFINITY
-
-X( 1) = (  1.32704238027086E+15, -2.93426063100200E+13)
-X( 2) = ( -2.93426063100198E+13, -1.32704238027086E+15)
-X( 3) = ( -7.02030987335861E-01,  6.75231619693301E-01)
-X( 4) = ( -8.69505074020740E-01, -4.57429302639467E-01)
-X( 5) = (  1.08754223629627E+15, -1.12644431041177E+15)
-X( 6) = ( -1.12644431041177E+15, -1.08754223629627E+15)
-X( 7) = (  6.91604259802748E-01,  5.53201633764775E-01)
-X( 8) = ( -1.22397321765075E+00,  2.82020968459965E-01)
-
-X( 9) = ( -1.11022302462516E-16, -6.10622663543836E-16)
-
-PATH NUMBER =        19
-
-ARCLEN =  1.09165495226673E+01
-NFE =  147
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.53432249391341E-15
-FINITE REAL SOLUTION
-
-X( 1) = ( -9.97032338354656E-01,  0.00000000000000E+00)
-X( 2) = ( -7.69838702264841E-02, -4.55860839682070E-16)
-X( 3) = ( -2.06407758039398E-02, -3.93207978939291E-16)
-X( 4) = (  9.99786956493339E-01,  1.15342927898622E-16)
-X( 5) = (  6.44732206382421E-01,  6.79865249038648E-17)
-X( 6) = (  7.64408517779111E-01, -2.00998861869758E-16)
-X( 7) = (  1.83959491902007E-01,  9.65099282439186E-17)
-X( 8) = ( -9.82933825513781E-01, -2.23027029748250E-16)
-
-X( 9) = ( -1.25643409234234E-01,  4.01652632244766E-01)
-
-PATH NUMBER =        20
-
-ARCLEN =  3.85195956734726E+01
-NFE =  229
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.96541171661302E-15
-SOLUTION AT INFINITY
-
-X( 1) = ( -6.24011499890476E+14,  7.70736600171453E+14)
-X( 2) = ( -7.70736600171452E+14, -6.24011499890476E+14)
-X( 3) = ( -5.48233064476348E-01, -4.71472733744234E-01)
-X( 4) = (  1.05076544763304E+00, -3.03874778108882E-01)
-X( 5) = (  9.88055767778080E+14,  9.96564209283845E+14)
-X( 6) = (  9.96564209283844E+14, -9.88055767778079E+14)
-X( 7) = ( -1.08267950847999E+00,  5.16185736471130E-02)
-X( 8) = ( -3.21126462424665E-01,  3.45148852924284E-01)
-
-X( 9) = (  1.44328993201270E-15, -1.55431223447522E-15)
-
-PATH NUMBER =        21
-
-ARCLEN =  7.91688829117837E+00
-NFE =  136
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.76816251676761E-17
-FINITE REAL SOLUTION
-
-X( 1) = ( -9.99996101363611E-01,  4.00915187354762E-16)
-X( 2) = (  2.79235699365496E-03,  5.94225648518980E-16)
-X( 3) = ( -7.87055930991066E-01,  3.98265833709651E-16)
-X( 4) = ( -6.16881643017351E-01,  2.60773638403005E-16)
-X( 5) = ( -9.64617850094969E-01, -1.84449211941004E-16)
-X( 6) = (  2.63652049637701E-01, -3.18100501137759E-16)
-X( 7) = ( -7.91552581806904E-01,  2.32741286884849E-16)
-X( 8) = ( -6.11101063846910E-01,  4.53808603286939E-16)
-
-X( 9) = ( -3.86802709131467E-01, -1.97454121259995E-01)
-
-PATH NUMBER =        22
-
-ARCLEN =  4.50017511291169E+01
-NFE =  195
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.66571932404312E-13
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -5.73993644466698E-01, -2.63874515550178E-01)
-X( 2) = ( -8.77471389081330E-01,  1.72612231859888E-01)
-X( 3) = ( -3.06129886067422E-01,  1.27633565998038E-01)
-X( 4) = (  9.61367068432926E-01,  4.06425914724200E-02)
-X( 5) = (  1.06286154111223E+00,  3.09983707316745E-02)
-X( 6) = ( -8.91250080068606E-02,  3.69671507746630E-01)
-X( 7) = (  5.35586935983270E-01,  3.55587300381420E-02)
-X( 8) = ( -8.45528470021279E-01,  2.25241277423825E-02)
-
-X( 9) = (  2.30976199121372E-01,  5.91537758416287E-01)
-
-PATH NUMBER =        23
-
-ARCLEN =  6.05520079246816E+00
-NFE =  133
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.21716488588060E-13
-SOLUTION AT INFINITY
-
-X( 1) = ( -5.68468230874466E+14,  2.31358266712316E+14)
-X( 2) = ( -2.31358266712315E+14, -5.68468230874467E+14)
-X( 3) = (  5.32128949447285E-01,  1.59324500557010E-01)
-X( 4) = (  2.66812426017460E+00, -4.81493891714671E-01)
-X( 5) = ( -1.57568911506491E-01, -1.51596541473584E+00)
-X( 6) = ( -1.49955548213979E+00,  1.67166448838867E+00)
-X( 7) = ( -1.21378666358565E+14, -4.42854614229030E+14)
-X( 8) = (  4.42854614229029E+14, -1.21378666358564E+14)
-
-X( 9) = ( -4.44089209850063E-16, -1.05471187339390E-15)
-
-PATH NUMBER =        24
-
-ARCLEN =  1.16291009094487E+01
-NFE =  156
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.27318036601087E-15
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  9.51044815428272E-01, -3.30314788813140E-03)
-X( 2) = ( -3.09237559760445E-01, -1.01586679057787E-02)
-X( 3) = ( -1.67483475490118E-01, -4.01571993917396E-02)
-X( 4) = (  9.86715940318371E-01, -6.81621431787977E-03)
-X( 5) = (  3.58070010433482E-01,  1.34366160073987E-01)
-X( 6) = ( -9.44687224087698E-01,  5.09295469577909E-02)
-X( 7) = (  8.88159812042096E-01, -2.54383575921028E-02)
-X( 8) = ( -4.62819970372660E-01, -4.88166638087582E-02)
-
-X( 9) = ( -6.95232770991984E-01,  1.06233901961051E+00)
-
-PATH NUMBER =        25
-
-ARCLEN =  1.11706365693787E+01
-NFE =  196
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.58584275550446E-18
-FINITE REAL SOLUTION
-
-X( 1) = (  6.15575098704294E-02, -1.78068540048575E-16)
-X( 2) = (  9.98103538205607E-01,  7.32419120427235E-17)
-X( 3) = ( -9.61509161663197E-01, -2.83026905626906E-16)
-X( 4) = (  2.74772873547838E-01, -1.20456909191089E-16)
-X( 5) = (  6.17807316614372E-01, -3.93235512180858E-16)
-X( 6) = (  7.86329523506366E-01, -1.45322713778372E-16)
-X( 7) = ( -6.73376870835456E-02, -1.59194786844095E-16)
-X( 8) = ( -9.97730242048540E-01, -2.86665134164428E-16)
-
-X( 9) = ( -6.66252336911780E-01,  1.15086906151559E-01)
-
-PATH NUMBER =        26
-
-ARCLEN =  2.18500694660882E+01
-NFE =  182
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.11253924107044E-13
-SOLUTION AT INFINITY
-
-X( 1) = (  1.65865341023896E+00, -2.87271023227692E+00)
-X( 2) = ( -1.99073045695714E+00,  2.17767263038217E+00)
-X( 3) = ( -2.55560607312858E+14, -2.87038727832243E+13)
-X( 4) = (  2.87038727832243E+13, -2.55560607312858E+14)
-X( 5) = ( -4.07436988250400E+15,  1.27601855965226E+15)
-X( 6) = (  1.27601855965226E+15,  4.07436988250400E+15)
-X( 7) = (  8.68849572616517E-01, -6.19694180469134E-01)
-X( 8) = (  7.37370783996105E-02, -3.92457035761794E-01)
-
-X( 9) = (  1.11022302462516E-16, -6.10622663543836E-16)
-
-PATH NUMBER =        27
-
-ARCLEN =  7.20029976208077E+01
-NFE =  239
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.47418954152796E-14
-SOLUTION AT INFINITY
-
-X( 1) = (  9.40461512056605E+14,  1.87180586095045E+15)
-X( 2) = (  1.87180586095044E+15, -9.40461512056606E+14)
-X( 3) = ( -6.41847364055722E-01,  7.04060730416129E-01)
-X( 4) = (  1.67850873260581E+00,  4.90973191919932E-01)
-X( 5) = (  1.59001640221735E+14,  2.77525642973757E+15)
-X( 6) = (  2.77525642973757E+15, -1.59001640221734E+14)
-X( 7) = ( -1.67758346843917E+00, -1.37407261243114E-01)
-X( 8) = ( -3.31045679731771E-01,  5.41154178314102E-01)
-
-X( 9) = ( -3.33066907387547E-16, -2.77555756156289E-16)
-
-PATH NUMBER =        28
-
-ARCLEN =  2.39699735337033E+01
-NFE =  189
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.45980616771900E-13
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -1.78654801866382E-02, -2.42461036816380E-01)
-X( 2) = (  1.02882744214246E+00, -4.21031037069327E-03)
-X( 3) = ( -3.32182462985700E+00,  2.10811115213544E+00)
-X( 4) = ( -2.17826339358040E+00, -3.21484333266471E+00)
-X( 5) = (  1.09509784985614E+00, -4.19501638504707E-02)
-X( 6) = (  1.00815582087588E-01,  4.55678906801489E-01)
-X( 7) = (  2.99182814752133E+00, -1.24565781632943E+00)
-X( 8) = (  1.30852462014185E+00,  2.84808864862660E+00)
-
-X( 9) = ( -1.67820611434007E-01, -8.80333166283119E-02)
-
-PATH NUMBER =        29
-
-ARCLEN =  1.13175000005968E+01
-NFE =  159
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.94580981649678E-15
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -1.29626865906875E-01, -1.85405888581043E-01)
-X( 2) = (  1.00902900917828E+00, -2.38185265624951E-02)
-X( 3) = ( -5.06099762670939E-01,  1.97612071536567E+00)
-X( 4) = ( -2.20339260732317E+00, -4.53897422425637E-01)
-X( 5) = ( -1.25562726235550E+00, -4.31546989110033E-02)
-X( 6) = ( -7.11621633744558E-02,  7.61447008943108E-01)
-X( 7) = (  2.34519131484161E-01, -1.86661190037688E+00)
-X( 8) = (  2.11473191547316E+00,  2.07003165976449E-01)
-
-X( 9) = ( -1.52203931508321E-01, -1.96388209633338E-01)
-
-PATH NUMBER =        30
-
-ARCLEN =  1.60026032723967E+01
-NFE =   94
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.70002869081969E-17
-FINITE REAL SOLUTION
-
-X( 1) = ( -7.82540497851946E-01,  1.44700562688192E-16)
-X( 2) = (  6.22599686172125E-01, -1.48793069820898E-16)
-X( 3) = ( -8.29709626974048E-01,  1.64279249234750E-16)
-X( 4) = ( -5.58195248015052E-01,  3.01183639044509E-16)
-X( 5) = ( -8.50226890899773E-01,  6.74600788521920E-16)
-X( 6) = (  5.26416407410432E-01, -1.04969710349206E-16)
-X( 7) = ( -7.55089439022002E-01,  2.95688072560099E-16)
-X( 8) = ( -6.55621795761427E-01,  2.91184269589138E-16)
-
-X( 9) = ( -3.74158415175350E-01, -1.34039666732455E-01)
-
-PATH NUMBER =        31
-
-ARCLEN =  1.14800298734807E+01
-NFE =  155
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.09898052087210E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -6.36299627199817E+12,  5.36535322031207E+13)
-X( 2) = (  5.36535322031208E+13,  6.36299627199832E+12)
-X( 3) = (  1.21997522883149E-01,  3.53842397723517E-01)
-X( 4) = ( -6.42032636383971E-02,  3.64078148726984E+00)
-X( 5) = ( -5.44452653974028E+00, -7.65585732822198E+00)
-X( 6) = ( -2.06798763507620E+00,  2.01987014673049E+00)
-X( 7) = ( -3.07643738965931E+13,  2.08221187781139E+13)
-X( 8) = ( -2.08221187781138E+13, -3.07643738965930E+13)
-
-X( 9) = ( -2.15383266777280E-14,  5.32907051820075E-15)
-
-PATH NUMBER =        32
-
-ARCLEN =  3.97012481909131E+01
-NFE =  220
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.56720251798777E-12
-SOLUTION AT INFINITY
-
-X( 1) = (  1.12924399973681E+13,  3.58418923255572E+12)
-X( 2) = (  3.58418923255693E+12, -1.12924399973673E+13)
-X( 3) = (  1.78408801701465E-01,  6.75920107387797E-01)
-X( 4) = ( -1.45940206221200E+00,  4.77408938894334E+00)
-X( 5) = ( -3.37071736470345E+00,  4.31687388408955E+00)
-X( 6) = ( -1.34622224646163E+00, -1.06750599437748E+00)
-X( 7) = ( -1.42399211109415E+13, -8.84270379590950E+12)
-X( 8) = ( -8.84270379590921E+12,  1.42399211109410E+13)
-
-X( 9) = ( -1.58761892521397E-14, -1.30451205393456E-14)
-
-PATH NUMBER =        33
-
-ARCLEN =  5.10718034668352E+00
-NFE =  112
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.35088984520458E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.27925568125805E+00,  2.82792348757016E-01)
-X( 2) = ( -4.22066367675236E-01,  8.57125197528378E-01)
-X( 3) = (  6.69598674729622E+00, -1.38313258399864E+00)
-X( 4) = ( -1.39815366279890E+00, -6.62404834220326E+00)
-X( 5) = ( -1.40358102984343E+00,  1.44410309311865E-01)
-X( 6) = (  2.03645160065797E-01,  9.95317397174895E-01)
-X( 7) = (  2.31705420969077E-01, -6.46288795781603E+00)
-X( 8) = (  6.53969930518755E+00,  2.28983949423161E-01)
-
-X( 9) = ( -7.37509356008076E-02,  9.67998378402968E-03)
-
-PATH NUMBER =        34
-
-ARCLEN =  2.51740332997736E+01
-NFE =  274
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.46925311035845E-15
-SOLUTION AT INFINITY
-
-X( 1) = ( -1.16282172680477E+14, -2.51958250760091E+14)
-X( 2) = ( -2.51958250760091E+14,  1.16282172680477E+14)
-X( 3) = ( -4.25680414618222E-01,  4.97681770092264E-01)
-X( 4) = (  9.40471660571082E-01,  3.75329695833391E-01)
-X( 5) = (  2.75428840904721E+14,  3.34504749891239E+13)
-X( 6) = ( -3.34504749891240E+13,  2.75428840904720E+14)
-X( 7) = (  2.68717725323942E-01, -9.01145046081421E-01)
-X( 8) = ( -1.05701067998911E+00, -5.08340667023254E-01)
-
-X( 9) = (  1.88737914186277E-15, -1.11022302462516E-16)
-
-PATH NUMBER =        35
-
-ARCLEN =  2.04916507308021E+01
-NFE =  186
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.67064535736036E-17
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.08707913283362E+00,  1.12206976693261E-01)
-X( 2) = (  2.52695630148078E-01, -4.82706657214905E-01)
-X( 3) = ( -7.60926702188130E-01,  3.00226576434989E-01)
-X( 4) = (  7.73530340563733E-01,  2.95334787449215E-01)
-X( 5) = (  1.11306763775108E+00, -1.06662124290859E-01)
-X( 6) = ( -2.25085865185255E-01, -5.27452750639072E-01)
-X( 7) = (  5.60758078600111E-01, -2.75952812846165E-01)
-X( 8) = ( -8.89908277794076E-01, -1.73886200384034E-01)
-
-X( 9) = ( -2.04555756223679E+00,  9.51327027110433E-01)
-
-PATH NUMBER =        36
-
-ARCLEN =  1.87132769094673E+00
-NFE =   91
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.56786483685733E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.32486380980226E+00,  1.59173912287482E-01)
-X( 2) = ( -2.37794058724459E-01,  8.86833577699621E-01)
-X( 3) = (  2.96311243351956E+00, -1.56100702523028E+00)
-X( 4) = ( -1.63399050229237E+00, -2.83076267504741E+00)
-X( 5) = (  9.91495870569985E-01, -1.35486485840605E-01)
-X( 6) = (  3.91324176491086E-01,  3.43281349068548E-01)
-X( 7) = (  6.78575243485845E-02, -2.51310594170735E+00)
-X( 8) = (  2.70463905111499E+00,  6.30520910210462E-02)
-
-X( 9) = ( -1.54237478496852E-01, -1.34947805796507E-02)
-
-PATH NUMBER =        37
-
-ARCLEN =  1.05288198830266E+01
-NFE =  161
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.56927323443617E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -8.69551687222466E+00,  8.90555432686759E+00)
-X( 2) = (  9.19147042227954E+00, -4.43904425809029E+00)
-X( 3) = (  9.57836661251671E+12,  4.41052498712201E+12)
-X( 4) = ( -4.41052498712193E+12,  9.57836661251673E+12)
-X( 5) = (  1.75046435759595E+14,  2.83074136180158E+12)
-X( 6) = (  2.83074136180154E+12, -1.75046435759594E+14)
-X( 7) = ( -1.88268385634203E+00,  1.58024659317404E+00)
-X( 8) = ( -5.12725892488039E-01, -6.07314961334428E-01)
-
-X( 9) = (  2.10942374678780E-15,  1.49880108324396E-14)
-
-PATH NUMBER =        38
-
-ARCLEN =  5.44137901108900E+00
-NFE =  176
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.65660304344598E-14
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.16231199225186E+00,  1.87679591182738E-01)
-X( 2) = (  3.33772014514245E-01, -6.53566596499012E-01)
-X( 3) = (  6.06760099173197E+00,  1.30472521573254E+00)
-X( 4) = ( -1.32197811553582E+00,  5.98841381705132E+00)
-X( 5) = ( -1.53635384798675E+00,  1.93378873591234E-01)
-X( 6) = (  2.52300382664391E-01,  1.17755816865431E+00)
-X( 7) = ( -5.91454538188605E+00, -7.03796500475614E-01)
-X( 8) = (  7.13926056317729E-01, -5.83062672224843E+00)
-
-X( 9) = (  1.24215569079551E-01, -6.46808333717409E-02)
-
-PATH NUMBER =        39
-
-ARCLEN =  2.66386480359561E+01
-NFE =  154
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.90370894997967E-15
-SOLUTION AT INFINITY
-
-X( 1) = ( -2.18026924767481E+15, -1.91660033519446E+15)
-X( 2) = (  1.91660033519446E+15, -2.18026924767481E+15)
-X( 3) = ( -3.25101109028330E-01, -6.60613782797359E-01)
-X( 4) = ( -1.02885325539423E+00,  2.56736109184645E-01)
-X( 5) = ( -2.22502053087016E+15,  2.31522817498352E+15)
-X( 6) = (  2.31522817498352E+15,  2.22502053087016E+15)
-X( 7) = (  5.18754303650450E-01,  6.71228885511584E-01)
-X( 8) = ( -1.10922803530276E+00,  4.80796201014823E-01)
-
-X( 9) = ( -6.66133814775094E-16, -3.33066907387547E-16)
-
-PATH NUMBER =        40
-
-ARCLEN =  4.50967756880316E+00
-NFE =  101
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.89099100234607E-17
-FINITE REAL SOLUTION
-
-X( 1) = ( -1.77426252777162E-01,  1.48187297873574E-16)
-X( 2) = ( -9.84134099005544E-01, -2.90244607464189E-16)
-X( 3) = ( -9.99539785563503E-01, -2.24317008757410E-16)
-X( 4) = (  3.03350799515492E-02, -4.13090656261851E-17)
-X( 5) = (  9.06036666598331E-01,  2.42405652973167E-16)
-X( 6) = ( -4.23199195154462E-01, -1.79165137603733E-16)
-X( 7) = ( -3.37009206790885E-01, -1.04870314989502E-16)
-X( 8) = ( -9.41501351320421E-01, -2.27200538649754E-16)
-
-X( 9) = ( -2.24155088380157E-01, -8.03151300664715E-01)
-
-PATH NUMBER =        41
-
-ARCLEN =  8.65966707788868E+00
-NFE =  160
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.95343879665561E-14
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.16231199224870E+00, -1.87679591177844E-01)
-X( 2) = (  3.33772014514984E-01,  6.53566596494599E-01)
-X( 3) = (  6.06760099170972E+00, -1.30472521572187E+00)
-X( 4) = ( -1.32197811552480E+00, -5.98841381702922E+00)
-X( 5) = ( -1.53635384798551E+00, -1.93378873593380E-01)
-X( 6) = (  2.52300382664500E-01, -1.17755816865262E+00)
-X( 7) = ( -5.91454538186549E+00,  7.03796500464423E-01)
-X( 8) = (  7.13926056307378E-01,  5.83062672222657E+00)
-
-X( 9) = ( -5.93195599271820E-02, -1.06456768755709E-02)
-
-PATH NUMBER =        42
-
-ARCLEN =  3.37015757316557E+00
-NFE =  133
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.64928277927540E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -4.67468500499131E-02,  1.84622189560539E+01)
-X( 2) = ( -7.96036877833257E+00, -1.50808630510497E+01)
-X( 3) = (  1.95169863238792E+12, -4.14695863828222E+12)
-X( 4) = ( -4.14695863828265E+12, -1.95169863238676E+12)
-X( 5) = ( -5.46748558043766E+13,  3.65429264991026E+13)
-X( 6) = ( -3.65429264990976E+13, -5.46748558043705E+13)
-X( 7) = ( -2.25029648506820E+00, -1.33412117927882E+00)
-X( 8) = ( -3.16879403514535E-01,  1.31977716658289E+00)
-
-X( 9) = ( -1.38777878078145E-14,  2.60902410786912E-15)
-
-PATH NUMBER =        43
-
-ARCLEN =  4.05422454627454E+01
-NFE =  255
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.17855050946614E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -1.78654801865854E-02,  2.42461036816495E-01)
-X( 2) = (  1.02882744214239E+00,  4.21031037065248E-03)
-X( 3) = ( -3.32182462985675E+00, -2.10811115213516E+00)
-X( 4) = ( -2.17826339358012E+00,  3.21484333266452E+00)
-X( 5) = (  1.09509784985601E+00,  4.19501638508566E-02)
-X( 6) = (  1.00815582087485E-01, -4.55678906801468E-01)
-X( 7) = (  2.99182814752128E+00,  1.24565781632953E+00)
-X( 8) = (  1.30852462014193E+00, -2.84808864862653E+00)
-
-X( 9) = (  1.25000167244686E-01, -1.10654614730742E-01)
-
-PATH NUMBER =        44
-
-ARCLEN =  6.87209266941617E+00
-NFE =  133
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.21803077710990E-12
-SOLUTION AT INFINITY
-
-X( 1) = (  1.11351261143843E+00, -2.36382377417378E+00)
-X( 2) = (  1.88467038270046E+00,  1.82535837138177E+00)
-X( 3) = (  3.52460727598616E+12,  9.22445701312489E+12)
-X( 4) = (  9.22445701312512E+12, -3.52460727598661E+12)
-X( 5) = ( -1.18282302020720E+14,  4.43727845971696E+13)
-X( 6) = (  4.43727845971686E+13,  1.18282302020720E+14)
-X( 7) = ( -2.53024911679591E+00,  2.03341620452210E+00)
-X( 8) = ( -4.44235928249462E-01, -1.24053599385256E+00)
-
-X( 9) = (  1.82076576038526E-14, -2.09277040141842E-14)
-
-PATH NUMBER =        45
-
-ARCLEN =  6.38893793628825E+01
-NFE =  227
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.77102228354746E-14
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.01563642853418E-01, -4.27103037978952E-01)
-X( 2) = (  8.40201275122214E-01, -4.07462208321918E-01)
-X( 3) = ( -3.63818630922042E+00, -3.13016201582208E+00)
-X( 4) = (  3.19905480977613E+00, -3.55983666075501E+00)
-X( 5) = (  1.08100630676357E+00,  8.35636949103710E-02)
-X( 6) = (  2.00993027177794E-01, -4.49432910599167E-01)
-X( 7) = (  6.88801025267135E-01, -3.94152999316649E+00)
-X( 8) = ( -4.06296944890418E+00, -6.68213220541555E-01)
-
-X( 9) = ( -7.30321082702332E-02,  4.11249344813740E-02)
-
-PATH NUMBER =        46
-
-ARCLEN =  4.37350564987266E+00
-NFE =  123
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.40219881298223E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  8.82849248270749E-02,  2.09844535749671E-01)
-X( 2) = (  1.01812160806675E+00, -1.81963617285457E-02)
-X( 3) = (  6.08392880071459E-01, -1.71205029496694E-03)
-X( 4) = ( -7.93638933696671E-01, -1.31243461674711E-03)
-X( 5) = ( -4.22090915226488E-01,  5.75142790295975E-01)
-X( 6) = (  1.09620780507533E+00,  2.21456685144902E-01)
-X( 7) = ( -9.54400887068394E-01, -2.08881184804470E-02)
-X( 8) = (  3.06255751857134E-01, -6.50947408694807E-02)
-
-X( 9) = ( -3.06027570570471E-01, -2.04415206529973E-01)
-
-PATH NUMBER =        47
-
-ARCLEN =  2.07106162993272E+01
-NFE =  191
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.14187348111427E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -2.01727215601573E+14,  1.00887685280499E+15)
-X( 2) = ( -1.00887685280499E+15, -2.01727215601573E+14)
-X( 3) = (  2.46517981454711E-01, -3.84425912986977E-01)
-X( 4) = (  6.44226296281173E-02, -3.79377707810024E+00)
-X( 5) = ( -4.97839841907117E+00, -7.48701740510912E+00)
-X( 6) = ( -1.94185359953962E+00,  1.91515455429440E+00)
-X( 7) = (  7.31558086728466E+14,  2.39471099496069E+14)
-X( 8) = ( -2.39471099496069E+14,  7.31558086728466E+14)
-
-X( 9) = ( -3.55271367880050E-15, -1.33226762955019E-15)
-
-PATH NUMBER =        48
-
-ARCLEN =  7.26710101429215E+00
-NFE =  135
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.45642664138408E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -9.39204444627280E+12,  5.67252787190611E+12)
-X( 2) = ( -5.67252787190707E+12, -9.39204444627421E+12)
-X( 3) = ( -2.12812943089544E+00, -1.13982441586874E+00)
-X( 4) = ( -3.10951258478236E+00,  5.93548360489605E+00)
-X( 5) = (  2.37553342541258E+00,  5.90287498352726E+00)
-X( 6) = ( -4.96770131249848E+00,  1.36820620378749E+00)
-X( 7) = (  1.45138158926830E+13,  8.64240119592286E+12)
-X( 8) = (  8.64240119592254E+12, -1.45138158926837E+13)
-
-X( 9) = (  3.17523785042795E-14,  8.10462807976364E-15)
-
-PATH NUMBER =        49
-
-ARCLEN =  5.99782773331883E+00
-NFE =  153
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.36223070118321E-15
-SOLUTION AT INFINITY
-
-X( 1) = ( -7.92892429908611E+14, -7.98926505984137E+14)
-X( 2) = (  7.98926505984137E+14, -7.92892429908611E+14)
-X( 3) = ( -6.66527704681323E-01, -1.71630051413040E-01)
-X( 4) = (  7.16143846218967E-01, -5.98498861133372E-01)
-X( 5) = ( -1.38666857626090E+15, -5.55179741245157E+14)
-X( 6) = (  5.55179741245156E+14, -1.38666857626090E+15)
-X( 7) = ( -9.69563969442307E-01,  3.95717387528197E-01)
-X( 8) = ( -3.29233907688547E-01, -3.61388419406819E-02)
-
-X( 9) = ( -3.33066907387547E-16,  3.88578058618805E-16)
-
-PATH NUMBER =        50
-
-ARCLEN =  3.89720333477143E+01
-NFE =  215
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.71594098757443E-18
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.32486380980226E+00, -1.59173912287484E-01)
-X( 2) = ( -2.37794058724459E-01, -8.86833577699619E-01)
-X( 3) = (  2.96311243351956E+00,  1.56100702523028E+00)
-X( 4) = ( -1.63399050229237E+00,  2.83076267504741E+00)
-X( 5) = (  9.91495870569984E-01,  1.35486485840604E-01)
-X( 6) = (  3.91324176491086E-01, -3.43281349068547E-01)
-X( 7) = (  6.78575243485874E-02,  2.51310594170734E+00)
-X( 8) = (  2.70463905111498E+00, -6.30520910210491E-02)
-
-X( 9) = (  1.08978975715379E-01, -7.77231258724949E-02)
-
-PATH NUMBER =        51
-
-ARCLEN =  1.73644902958052E+01
-NFE =  152
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.99820589491795E-18
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -3.59213282135406E-01, -1.75620811047260E-01)
-X( 2) = (  9.51945474476281E-01, -6.62698963743445E-02)
-X( 3) = (  1.07619680311176E+00,  3.86550605399055E-02)
-X( 4) = ( -1.01778566379969E-01,  4.08734904182388E-01)
-X( 5) = ( -1.33456507217685E+00,  6.81624099524749E-01)
-X( 6) = (  8.74702052835710E-01,  1.03997894212166E+00)
-X( 7) = ( -1.07398005488249E+00,  6.47210247186725E-02)
-X( 8) = ( -1.65402932515429E-01, -4.20240975309954E-01)
-
-X( 9) = ( -6.02148775744418E-01, -8.41465441839351E-02)
-
-PATH NUMBER =        52
-
-ARCLEN =  2.05382881321710E+02
-NFE =  531
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.37987280914981E-12
-SOLUTION AT INFINITY
-
-X( 1) = (  2.64207883408119E+12, -2.80612741316252E+13)
-X( 2) = ( -2.80612741316252E+13, -2.64207883408157E+12)
-X( 3) = (  2.17246752893714E-01,  4.13988322217672E-01)
-X( 4) = ( -6.35089777047299E-02,  3.74239963042912E+00)
-X( 5) = ( -5.35346989740781E+00, -5.86481358556843E+00)
-X( 6) = ( -1.34444321445184E+00,  1.82151218164705E+00)
-X( 7) = (  1.57815845624231E+13, -1.12468167681856E+13)
-X( 8) = (  1.12468167681853E+13,  1.57815845624229E+13)
-
-X( 9) = (  4.15223411209809E-14, -9.21485110438880E-15)
-
-PATH NUMBER =        53
-
-ARCLEN =  9.09336396447648E+00
-NFE =  168
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.55689033387826E-15
-SOLUTION AT INFINITY
-
-X( 1) = ( -6.71123761250952E+14,  4.95105885371072E+14)
-X( 2) = (  4.95105885371072E+14,  6.71123761250952E+14)
-X( 3) = ( -4.03047688904372E-01,  6.40911898749575E-01)
-X( 4) = ( -1.07866608069643E+00, -3.25967493502953E-01)
-X( 5) = ( -1.27176827901407E+15, -2.95695269483927E+14)
-X( 6) = (  2.95695269483926E+14, -1.27176827901407E+15)
-X( 7) = ( -1.03200458285899E+00, -1.29737718987987E-01)
-X( 8) = ( -1.66888597467985E-01, -1.88049113414882E-01)
-
-X( 9) = ( -2.22044604925031E-16,  3.33066907387547E-16)
-
-PATH NUMBER =        54
-
-ARCLEN =  1.25452507746004E+01
-NFE =  163
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.38860853550221E-13
-SOLUTION AT INFINITY
-
-X( 1) = (  2.71137453638548E+15,  2.06616928940306E+15)
-X( 2) = (  2.06616928940306E+15, -2.71137453638548E+15)
-X( 3) = ( -3.86431732579011E-01,  3.35387409630743E+00)
-X( 4) = ( -3.93980170525731E+00,  1.80956008555423E+00)
-X( 5) = (  1.17461905301462E+00,  2.26282934810632E+01)
-X( 6) = ( -4.70012555605312E+00, -3.36044008705072E+00)
-X( 7) = (  2.99979478276401E+15,  3.77652105635763E+15)
-X( 8) = (  3.77652105635763E+15, -2.99979478276401E+15)
-
-X( 9) = (  1.11022302462516E-16, -5.55111512312578E-17)
-
-PATH NUMBER =        55
-
-ARCLEN =  1.01016597615883E+01
-NFE =  176
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.52532064728369E-15
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -1.17580884606015E+00, -3.91945730962369E-01)
-X( 2) = (  6.00333423168922E-01, -7.67662168813460E-01)
-X( 3) = ( -4.46316901221626E-01,  4.48073453470396E-02)
-X( 4) = ( -8.96273829690172E-01, -2.23126848790970E-02)
-X( 5) = ( -1.71041655462014E+00,  8.19910369153663E-01)
-X( 6) = (  9.53617690809594E-01,  1.47059799982795E+00)
-X( 7) = ( -9.69616408977200E-01,  9.02774498392305E-03)
-X( 8) = ( -2.47341824528349E-01, -3.53900909769933E-02)
-
-X( 9) = ( -1.95982679498838E-01, -2.23138018503426E-01)
-
-PATH NUMBER =        56
-
-ARCLEN =  6.90092800237652E+01
-NFE =  221
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.60920566489584E-15
-FINITE REAL SOLUTION
-
-X( 1) = ( -3.23572566938689E-01, -1.61743516882858E-15)
-X( 2) = ( -9.46203357595346E-01, -1.48260655433193E-15)
-X( 3) = ( -7.82982639239781E-01,  3.77749435119234E-16)
-X( 4) = ( -6.22043556874521E-01,  4.80939002601912E-16)
-X( 5) = ( -8.67196525522166E-01, -1.67819945855485E-15)
-X( 6) = ( -4.97966049166271E-01, -1.34095007176132E-16)
-X( 7) = (  7.73321237566211E-01,  1.54526242388242E-16)
-X( 8) = (  6.34014403250480E-01,  5.76564922536846E-16)
-
-X( 9) = ( -1.17504491806870E-01, -6.39366195929377E-01)
-
-PATH NUMBER =        57
-
-ARCLEN =  1.68640447767062E+01
-NFE =  194
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.27027144264894E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -8.65821850296858E+00,  3.39271832888079E+01)
-X( 2) = ( -6.30471274891811E+00, -3.02957554589711E+01)
-X( 3) = (  5.88632855441610E+12, -8.15966385190246E+12)
-X( 4) = ( -8.15966385190322E+12, -5.88632855441469E+12)
-X( 5) = ( -1.32734443357711E+14,  5.67648446903876E+13)
-X( 6) = ( -5.67648446903826E+13, -1.32734443357702E+14)
-X( 7) = ( -2.40457990062250E+00, -1.06998484599138E+00)
-X( 8) = ( -3.33040589051801E-01,  1.51374762959647E+00)
-
-X( 9) = ( -5.99520433297585E-15,  2.33146835171283E-15)
-
-PATH NUMBER =        58
-
-ARCLEN =  5.82042983039519E+01
-NFE =  295
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.83093286451210E-16
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.52882796872255E+00,  5.93006252708735E-01)
-X( 2) = ( -7.34212672558193E-01,  1.23479827937267E+00)
-X( 3) = ( -6.27822700511963E-01, -2.57790977457448E-01)
-X( 4) = (  8.42157099175799E-01, -1.92181515531187E-01)
-X( 5) = (  1.34052542652374E+00,  1.04876828069924E+00)
-X( 6) = ( -1.25119464901039E+00,  1.12364654685895E+00)
-X( 7) = (  7.03035713465316E-01, -2.44536619572993E-01)
-X( 8) = ( -7.83389442654810E-01, -2.19454038373669E-01)
-
-X( 9) = ( -1.41307396752142E+00, -5.06255315905765E+00)
-
-PATH NUMBER =        59
-
-ARCLEN =  1.65745434914710E+01
-NFE =  207
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.87270435894905E-12
-SOLUTION AT INFINITY
-
-X( 1) = (  3.72266632671660E+00, -2.01290261942159E+00)
-X( 2) = ( -2.72956834635488E+00, -8.69443370050761E-01)
-X( 3) = (  1.16339185342612E+12, -2.68050143643014E+12)
-X( 4) = (  2.68050143642964E+12,  1.16339185342585E+12)
-X( 5) = ( -3.95917889660490E+13, -2.24032542812834E+13)
-X( 6) = (  2.24032542812839E+13, -3.95917889660480E+13)
-X( 7) = ( -1.51672500685610E+00, -6.73381060873742E-01)
-X( 8) = (  6.69900025192281E-01,  1.30047761670888E+00)
-
-X( 9) = ( -5.10702591327572E-15,  2.14828155264968E-14)
-
-PATH NUMBER =        60
-
-ARCLEN =  1.15359102744104E+02
-NFE =  335
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.63548310676124E-12
-SOLUTION AT INFINITY
-
-X( 1) = (  2.50562435272683E+00,  1.03032733451535E+01)
-X( 2) = ( -1.34276003807276E-01, -8.15078283351658E+00)
-X( 3) = ( -1.38712900676909E+12, -8.36434225434348E+10)
-X( 4) = (  8.36434225437251E+10, -1.38712900677037E+12)
-X( 5) = (  4.33121332988724E+12, -2.06233332609164E+13)
-X( 6) = (  2.06233332609178E+13,  4.33121332988735E+12)
-X( 7) = (  3.78863483761560E-01, -4.17894931420039E+00)
-X( 8) = (  7.24427235964363E-02,  8.23567302793246E-01)
-
-X( 9) = (  4.46309655899313E-14,  2.57016630200724E-14)
-
-PATH NUMBER =        61
-
-ARCLEN =  4.46147524539845E+00
-NFE =  154
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.65976706939863E-14
-SOLUTION AT INFINITY
-
-X( 1) = (  6.59637543875152E+14, -5.76417145682391E+14)
-X( 2) = (  5.76417145682392E+14,  6.59637543875152E+14)
-X( 3) = ( -6.16819259251664E-01, -1.02449269435401E+00)
-X( 4) = ( -1.42339188435097E+00,  5.00291051706641E-01)
-X( 5) = (  1.18919094823434E+15, -7.66751298931012E+14)
-X( 6) = (  7.66751298931010E+14,  1.18919094823434E+15)
-X( 7) = ( -1.13501245341707E+00,  6.72529627452570E-02)
-X( 8) = ( -2.01896248595329E-01, -9.81951530427169E-03)
-
-X( 9) = (  6.66133814775094E-16,  1.11022302462516E-16)
-
-PATH NUMBER =        62
-
-ARCLEN =  5.26865684637596E+02
-NFE =  731
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.53845080077012E-14
-FINITE REAL SOLUTION
-
-X( 1) = (  8.10309088191085E-01, -2.11448825928198E-16)
-X( 2) = (  5.86002714665155E-01, -2.31924423497388E-15)
-X( 3) = (  5.45184304735711E-01,  1.28031400310561E-15)
-X( 4) = ( -8.38316213531530E-01,  2.71404415000222E-15)
-X( 5) = (  9.37646003039470E-01, -2.68064155144589E-15)
-X( 6) = (  3.47591675654209E-01, -7.66953548729143E-16)
-X( 7) = (  3.68121016397545E-01,  9.82010627864223E-16)
-X( 8) = (  9.29777885995602E-01, -1.41834444846075E-16)
-
-X( 9) = ( -3.03851544864546E-01, -5.13626832007992E-01)
-
-PATH NUMBER =        63
-
-ARCLEN =  3.61503027646024E+01
-NFE =  261
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.10617867989564E-15
-SOLUTION AT INFINITY
-
-X( 1) = ( -1.30418826321870E+14,  2.51081149743851E+14)
-X( 2) = ( -2.51081149743851E+14, -1.30418826321870E+14)
-X( 3) = ( -4.04912826316230E-01, -4.51635088459459E-01)
-X( 4) = (  1.03608983235264E+00, -1.83902512905848E-01)
-X( 5) = (  2.82109625171269E+14, -2.09637814473375E+13)
-X( 6) = ( -2.09637814473375E+13, -2.82109625171269E+14)
-X( 7) = (  6.48154836573825E-01,  7.58677254381906E-01)
-X( 8) = ( -1.15288840102048E+00,  4.32860050435454E-01)
-
-X( 9) = (  2.33146835171283E-15, -1.02140518265514E-14)
-
-PATH NUMBER =        64
-
-ARCLEN =  2.01878631152123E+02
-NFE =  469
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.03842414867380E-13
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  6.17653599891819E-01, -6.36907669143313E-02)
-X( 2) = ( -7.90592480178209E-01, -4.97586714404944E-02)
-X( 3) = ( -8.96723890425281E-01, -6.96526650739983E-02)
-X( 4) = (  4.67530808227747E-01, -1.33593781852376E-01)
-X( 5) = (  4.08955073213402E-01, -5.09587694769554E-01)
-X( 6) = ( -1.06340978278928E+00, -1.95971935180591E-01)
-X( 7) = (  9.07104450970926E-01,  9.39529209909687E-02)
-X( 8) = ( -4.68117719657280E-01,  1.82059147162844E-01)
-
-X( 9) = ( -2.43500608965039E+00, -1.61339774102082E+00)
-
-PATH NUMBER =        65
-
-ARCLEN =  1.57609256329834E+01
-NFE =  215
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.59235131785557E-13
-SOLUTION AT INFINITY
-
-X( 1) = (  2.61915811860982E+01, -5.49693058926724E+01)
-X( 2) = ( -2.99876973109164E+00,  4.64526405514385E+01)
-X( 3) = ( -7.87483499144746E+14, -3.00717284393645E+15)
-X( 4) = ( -3.00717284393645E+15,  7.87483499144746E+14)
-X( 5) = ( -3.66320138469992E+16,  1.12042580467793E+16)
-X( 6) = (  1.12042580467793E+16,  3.66320138469992E+16)
-X( 7) = ( -1.26877592001206E+01, -8.72682732495708E+00)
-X( 8) = (  2.10726798429671E+00, -1.34325358210834E+01)
-
-X( 9) = (  0.00000000000000E+00, -5.55111512312578E-17)
-
-PATH NUMBER =        66
-
-ARCLEN =  1.59826728388062E+01
-NFE =  197
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.73383486578752E-15
-SOLUTION AT INFINITY
-
-X( 1) = (  2.50058447114935E+14, -4.52892945619734E+14)
-X( 2) = ( -4.52892945619734E+14, -2.50058447114935E+14)
-X( 3) = ( -9.75659527399232E-01,  4.75072419111679E-01)
-X( 4) = (  1.28139780219241E+00,  3.18593697539371E-01)
-X( 5) = (  1.37334888818907E+14, -4.82185873394123E+14)
-X( 6) = ( -4.82185873394123E+14, -1.37334888818907E+14)
-X( 7) = (  8.31638283223266E-01,  9.04387488477603E-01)
-X( 8) = ( -1.52670155839502E+00,  5.75692944562625E-01)
-
-X( 9) = (  1.44328993201270E-15, -8.32667268468867E-16)
-
-PATH NUMBER =        67
-
-ARCLEN =  2.99646867288131E+02
-NFE =  560
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.21201932369085E-12
-SOLUTION AT INFINITY
-
-X( 1) = (  2.65387819023335E+13,  2.65481304773054E+12)
-X( 2) = (  2.65481304772559E+12, -2.65387819023341E+13)
-X( 3) = ( -7.72038861724184E-01, -9.00644007787009E-01)
-X( 4) = (  6.85903222977730E+00,  4.09582788695488E-01)
-X( 5) = (  1.28843562984141E+01, -4.75487609789527E+00)
-X( 6) = ( -2.59572105958879E+00, -4.11313770900436E+00)
-X( 7) = ( -1.05554386106483E+13, -1.49955388257125E+13)
-X( 8) = (  1.49955388257118E+13, -1.05554386106445E+13)
-
-X( 9) = ( -2.22044604925031E-16, -1.71529457304587E-14)
-
-PATH NUMBER =        68
-
-ARCLEN =  1.18076885554796E+01
-NFE =  148
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.82367224207990E-13
-SOLUTION AT INFINITY
-
-X( 1) = ( -7.90195422114385E+00, -1.84106474534002E+01)
-X( 2) = (  1.12505124953494E+01,  1.11615813986570E+01)
-X( 3) = ( -1.60983950476676E+12, -1.26442025591197E+13)
-X( 4) = ( -1.26442025591196E+13,  1.60983950476682E+12)
-X( 5) = (  6.71411981352235E+13, -1.59421257637201E+14)
-X( 6) = (  1.59421257637202E+14,  6.71411981352233E+13)
-X( 7) = ( -1.67630894538596E+00, -1.86622223167240E+00)
-X( 8) = ( -3.49710431889513E-01,  7.29533002528198E-01)
-
-X( 9) = (  6.66133814775094E-15,  1.83186799063151E-15)
-
-PATH NUMBER =        69
-
-ARCLEN =  9.91582335501099E+00
-NFE =  135
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.97160645491797E-13
-FINITE REAL SOLUTION
-
-X( 1) = (  4.77229881857333E-03,  3.57834451431919E-14)
-X( 2) = ( -9.99988612517171E-01,  9.68706203367998E-15)
-X( 3) = ( -7.94232615166533E-01, -1.33872870172886E-14)
-X( 4) = ( -6.07613818971968E-01,  1.08712886523208E-14)
-X( 5) = (  9.97769920671347E-01,  9.90662753996672E-14)
-X( 6) = (  6.67471752440601E-02,  2.05208109358675E-15)
-X( 7) = (  9.52226100439723E-01,  1.42265982861061E-14)
-X( 8) = (  3.05393931900056E-01, -3.79469105333857E-14)
-
-X( 9) = (  2.97448243065865E-01, -6.19857729773614E-01)
-
-PATH NUMBER =        70
-
-ARCLEN =  5.80968526985336E+00
-NFE =  123
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.68844731846154E-15
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.27925568125805E+00, -2.82792348757020E-01)
-X( 2) = ( -4.22066367675241E-01, -8.57125197528378E-01)
-X( 3) = (  6.69598674729620E+00,  1.38313258399867E+00)
-X( 4) = ( -1.39815366279892E+00,  6.62404834220324E+00)
-X( 5) = ( -1.40358102984343E+00, -1.44410309311876E-01)
-X( 6) = (  2.03645160065800E-01, -9.95317397174896E-01)
-X( 7) = (  2.31705420969049E-01,  6.46288795781600E+00)
-X( 8) = (  6.53969930518751E+00, -2.28983949423136E-01)
-
-X( 9) = (  6.07009391219222E-02, -2.75283364516227E-02)
-
-PATH NUMBER =        71
-
-ARCLEN =  1.06798765842850E+01
-NFE =  144
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.85521732402649E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -1.49926856688082E+00,  6.11168097539558E+00)
-X( 2) = (  1.82070265176151E+00, -3.58042374994551E+00)
-X( 3) = ( -5.97513759796471E+12,  1.68093059554660E+12)
-X( 4) = ( -1.68093059554675E+12, -5.97513759796597E+12)
-X( 5) = ( -1.19642981476035E+13, -9.33633335357752E+13)
-X( 6) = (  9.33633335357766E+13, -1.19642981476039E+13)
-X( 7) = ( -5.25720211428067E-01, -4.76742096953918E+00)
-X( 8) = (  7.46685201367482E-02,  6.26248875693537E-01)
-
-X( 9) = (  7.54951656745106E-15,  8.71525074330748E-15)
-
-PATH NUMBER =        72
-
-ARCLEN =  8.00453647756934E+00
-NFE =  137
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.11085980425371E-12
-SOLUTION AT INFINITY
-
-X( 1) = (  5.58045583995999E+00, -2.53761321445231E+00)
-X( 2) = ( -4.12267536031753E+00, -8.92299309188150E-01)
-X( 3) = (  6.74083497364304E+12, -1.36625826001836E+13)
-X( 4) = (  1.36625826001831E+13,  6.74083497364296E+12)
-X( 5) = ( -2.00471444096012E+14, -1.26745383658511E+14)
-X( 6) = (  1.26745383658512E+14, -2.00471444096011E+14)
-X( 7) = ( -1.43494360930168E+00, -5.51588260437304E-01)
-X( 8) = (  7.85538442995540E-01,  1.54536278688818E+00)
-
-X( 9) = ( -7.77156117237610E-16,  4.16333634234434E-15)
-
-PATH NUMBER =        73
-
-ARCLEN =  6.52749530061860E+00
-NFE =  152
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.62204174333016E-13
-SOLUTION AT INFINITY
-
-X( 1) = ( -5.67176299404420E+13, -3.66953605644613E+14)
-X( 2) = ( -3.66953605644613E+14,  5.67176299404417E+13)
-X( 3) = ( -9.08336222092668E-01,  5.52353742647508E-01)
-X( 4) = ( -9.76014409302343E-01, -6.52697415760061E-01)
-X( 5) = ( -1.76571779312536E+14, -5.73174200217712E+14)
-X( 6) = ( -5.73174200217714E+14,  1.76571779312537E+14)
-X( 7) = ( -6.32130252507263E-01, -2.53009901506468E-01)
-X( 8) = ( -4.16210618058072E-01,  2.14133339505827E-01)
-
-X( 9) = (  2.88657986402541E-15,  3.88578058618805E-16)
-
-PATH NUMBER =        74
-
-ARCLEN =  3.87838531589883E+00
-NFE =  121
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.06214302625276E-16
-FINITE REAL SOLUTION
-
-X( 1) = ( -6.44884386482951E-01,  1.76925358491567E-15)
-X( 2) = (  7.64280137168633E-01, -8.21616041856169E-16)
-X( 3) = (  6.26491381419069E-01,  1.94384725057368E-16)
-X( 4) = (  7.79428347577649E-01, -1.36611540027497E-15)
-X( 5) = ( -7.57037314113675E-01, -1.05029833597013E-15)
-X( 6) = (  6.53371643890021E-01, -1.81134103800407E-15)
-X( 7) = ( -4.88045334896595E-01,  4.24091221650568E-16)
-X( 8) = ( -8.72818280677982E-01,  1.09106264133257E-15)
-
-X( 9) = ( -2.37519449389792E-01,  2.12787722787150E-01)
-
-PATH NUMBER =        75
-
-ARCLEN =  3.58662755453096E+00
-NFE =  114
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.72133388179643E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -6.76966762265286E+12, -6.21929669873380E+12)
-X( 2) = (  6.21929669873672E+12, -6.76966762264921E+12)
-X( 3) = ( -1.44363892498120E+00,  1.54438908324355E-01)
-X( 4) = ( -3.27996389855939E-02,  2.62845718505922E-01)
-X( 5) = (  9.53896233999743E+00,  7.18296429053466E+00)
-X( 6) = ( -3.52290184313787E+00, -2.52527865281583E-01)
-X( 7) = (  3.53796492224735E+12, -1.37033749074463E+13)
-X( 8) = ( -1.37033749074468E+13, -3.53796492224761E+12)
-
-X( 9) = ( -2.09832151654155E-14,  1.94289029309402E-14)
-
-PATH NUMBER =        76
-
-ARCLEN =  6.49292634962471E+00
-NFE =  113
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.55195283626061E-16
-FINITE REAL SOLUTION
-
-X( 1) = (  9.76148462455548E-01, -4.87317805116384E-17)
-X( 2) = (  2.17104074686936E-01, -6.26375520372853E-17)
-X( 3) = (  7.09264760346985E-02,  1.07193013452909E-16)
-X( 4) = (  9.97481546193863E-01,  5.07158186497198E-17)
-X( 5) = (  9.26212713628612E-01,  1.19573599542387E-16)
-X( 6) = ( -3.77001338343410E-01,  6.62837896508036E-17)
-X( 7) = ( -1.53496719696746E-01, -5.65800332150176E-17)
-X( 8) = ( -9.88149157284637E-01,  0.00000000000000E+00)
-
-X( 9) = ( -7.61530521888626E-01,  4.28700327863973E-01)
-
-PATH NUMBER =        77
-
-ARCLEN =  3.90381191890300E+01
-NFE =  201
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.56229888380647E-13
-SOLUTION AT INFINITY
-
-X( 1) = (  2.95000467497390E+00, -2.37203027793765E+00)
-X( 2) = ( -2.94579111565321E+00, -7.04780674501094E-01)
-X( 3) = (  1.86818011656313E+13,  1.53297778739092E+14)
-X( 4) = ( -1.53297778739092E+14,  1.86818011656314E+13)
-X( 5) = ( -1.41203305929705E+15, -2.27705301030881E+15)
-X( 6) = ( -2.27705301030881E+15,  1.41203305929705E+15)
-X( 7) = (  8.11369120316719E-02, -9.31019799436942E-01)
-X( 8) = ( -1.56677765114515E-01,  2.54017974125499E-01)
-
-X( 9) = ( -8.88178419700125E-16, -6.10622663543836E-16)
-
-PATH NUMBER =        78
-
-ARCLEN =  6.26256164605491E+00
-NFE =  132
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.40690608338360E-14
-SOLUTION AT INFINITY
-
-X( 1) = (  1.52902876389474E+14,  1.10263995187164E+14)
-X( 2) = ( -1.10263995187163E+14,  1.52902876389474E+14)
-X( 3) = ( -6.71472506413255E-01, -4.06953034189852E-01)
-X( 4) = (  8.96157729276769E-01, -2.40998640894880E-01)
-X( 5) = (  1.20328324492341E+14,  1.37467266520416E+14)
-X( 6) = ( -1.37467266520416E+14,  1.20328324492341E+14)
-X( 7) = (  4.37277130932935E-01, -6.06001381679735E-01)
-X( 8) = ( -1.10479839308865E+00, -3.72793607258114E-01)
-
-X( 9) = (  2.55351295663786E-15, -4.05231403988182E-15)
-
-PATH NUMBER =        79
-
-ARCLEN =  8.99878626638884E+00
-NFE =  153
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.92487622552593E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -3.47360741071676E+13,  2.42764525882870E+13)
-X( 2) = ( -2.42764525882873E+13, -3.47360741071681E+13)
-X( 3) = ( -3.82123931607527E-02,  1.18201452643882E-02)
-X( 4) = (  4.43361120706640E+00, -2.26024354083597E+00)
-X( 5) = ( -2.22205806295669E+00, -1.98195362855274E+00)
-X( 6) = ( -5.63603904506248E-01,  4.09999529313290E+00)
-X( 7) = ( -1.49491636671862E+13, -2.79611049325747E+13)
-X( 8) = (  2.79611049325728E+13, -1.49491636671838E+13)
-
-X( 9) = ( -2.88657986402541E-15, -1.63202784619898E-14)
-
-PATH NUMBER =        80
-
-ARCLEN =  6.27812058969164E+00
-NFE =   93
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.16183754565365E-13
-SOLUTION AT INFINITY
-
-X( 1) = ( -2.40326490384762E+00, -4.29313425918859E-01)
-X( 2) = (  2.37612926583170E+00,  9.36567218114100E-01)
-X( 3) = (  1.21828108884828E+14, -7.32308374951901E+13)
-X( 4) = (  7.32308374951905E+13,  1.21828108884828E+14)
-X( 5) = ( -1.38383888753450E+15,  2.04127689190711E+15)
-X( 6) = (  2.04127689190712E+15,  1.38383888753450E+15)
-X( 7) = ( -2.49867469787862E+00,  8.56689698393018E-01)
-X( 8) = (  2.10295244129460E-01, -7.79791405343795E-01)
-
-X( 9) = (  9.99200722162641E-16, -6.10622663543836E-16)
-
-PATH NUMBER =        81
-
-ARCLEN =  2.50996952846533E+02
-NFE =  564
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.21233214146462E-18
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.16805813859714E+00,  2.64606830344748E-01)
-X( 2) = (  4.41763649679255E-01, -6.99641452928462E-01)
-X( 3) = (  2.18650479698318E+00,  2.11047855621063E+00)
-X( 4) = ( -2.22789002770865E+00,  2.07127435811125E+00)
-X( 5) = (  1.11182382946579E+00, -1.91784047471523E-01)
-X( 6) = (  3.68368798447796E-01,  5.78849443787668E-01)
-X( 7) = ( -1.37945707030438E+00, -1.76735543503195E+00)
-X( 8) = (  1.94659755754041E+00, -1.25243707470597E+00)
-
-X( 9) = (  6.35485760512494E-02, -2.10074840572070E-01)
-
-PATH NUMBER =        82
-
-ARCLEN =  2.04339702325886E+01
-NFE =  152
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.91985206988551E-15
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.52882796872255E+00, -5.93006252708735E-01)
-X( 2) = ( -7.34212672558192E-01, -1.23479827937268E+00)
-X( 3) = ( -6.27822700511963E-01,  2.57790977457448E-01)
-X( 4) = (  8.42157099175799E-01,  1.92181515531187E-01)
-X( 5) = (  1.34052542652374E+00, -1.04876828069924E+00)
-X( 6) = ( -1.25119464901039E+00, -1.12364654685895E+00)
-X( 7) = (  7.03035713465315E-01,  2.44536619572994E-01)
-X( 8) = ( -7.83389442654810E-01,  2.19454038373669E-01)
-
-X( 9) = (  7.77310107334959E-01, -1.00989113913861E+00)
-
-PATH NUMBER =        83
-
-ARCLEN =  1.06499419622216E+01
-NFE =  139
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.54718545367269E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -2.42125629177330E+15,  5.65076978481140E+14)
-X( 2) = ( -5.65076978481140E+14, -2.42125629177330E+15)
-X( 3) = (  1.84967954846483E-01, -4.12883614248350E-02)
-X( 4) = ( -3.16028788675709E+00, -2.36216308636430E-02)
-X( 5) = ( -1.60666284262919E+00,  4.75248168576030E+00)
-X( 6) = (  1.14634166295457E+00,  5.70052382992642E-01)
-X( 7) = (  2.04721667836644E+14,  1.84889889029906E+15)
-X( 8) = ( -1.84889889029906E+15,  2.04721667836644E+14)
-
-X( 9) = ( -1.11022302462516E-15,  1.11022302462516E-15)
-
-PATH NUMBER =        84
-
-ARCLEN =  4.61297938989652E+00
-NFE =  117
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.20468247642033E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -6.17196366653145E+12,  7.44995342327427E+12)
-X( 2) = ( -7.44995342327472E+12, -6.17196366653179E+12)
-X( 3) = ( -6.26701622023630E-01, -3.53109714890856E-01)
-X( 4) = (  1.04492772753225E-01, -4.85943437592491E-01)
-X( 5) = ( -3.34335758792818E+00,  5.98847331693779E+00)
-X( 6) = ( -2.44210829050287E+00, -6.48586514641084E-01)
-X( 7) = (  1.45929556786955E+13,  2.98042473706642E+12)
-X( 8) = (  2.98042473706623E+12, -1.45929556786957E+13)
-
-X( 9) = (  3.09752223870419E-14,  2.05391259555654E-14)
-
-PATH NUMBER =        85
-
-ARCLEN =  3.23174646451683E+00
-NFE =  115
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.94277193247456E-18
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.45196877409836E-01, -7.92235415426023E-01)
-X( 2) = (  1.12566385494450E+00, -5.94844452320604E-01)
-X( 3) = ( -3.54281084626982E-01, -8.41957515842723E-02)
-X( 4) = ( -9.39458343171758E-01,  3.17512345375026E-02)
-X( 5) = ( -1.16156403958416E+00, -1.51629198529726E+00)
-X( 6) = (  1.72860198938114E+00, -1.01889865593729E+00)
-X( 7) = ( -9.87295286067430E-01,  5.58588121492162E-03)
-X( 8) = ( -1.62572967705492E-01, -3.39227011099108E-02)
-
-X( 9) = ( -4.45531168796632E-01, -3.40480635231494E-02)
-
-PATH NUMBER =        86
-
-ARCLEN =  8.63542009593514E+00
-NFE =  188
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.08896723044873E-13
-SOLUTION AT INFINITY
-
-X( 1) = ( -3.24421433895697E+14,  2.09734861678357E+14)
-X( 2) = ( -2.09734861678359E+14, -3.24421433895698E+14)
-X( 3) = ( -2.49889274112322E-01, -6.57234663556118E-01)
-X( 4) = ( -1.35643344101889E+00,  2.02633813817153E-01)
-X( 5) = ( -4.45972363549639E+14, -9.36376774752170E+13)
-X( 6) = (  9.36376774752287E+13, -4.45972363549637E+14)
-X( 7) = ( -1.24773069763594E-01,  5.39825895481647E-01)
-X( 8) = ( -1.23732181253881E+00,  3.70809883129705E-01)
-
-X( 9) = ( -2.66453525910038E-15,  1.05471187339390E-15)
-
-PATH NUMBER =        87
-
-ARCLEN =  3.53341323499326E+00
-NFE =  159
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.18943785607317E-18
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.01563642853416E-01,  4.27103037978948E-01)
-X( 2) = (  8.40201275122200E-01,  4.07462208321900E-01)
-X( 3) = ( -3.63818630922037E+00,  3.13016201582224E+00)
-X( 4) = (  3.19905480977629E+00,  3.55983666075496E+00)
-X( 5) = (  1.08100630676358E+00, -8.35636949104292E-02)
-X( 6) = (  2.00993027177774E-01,  4.49432910599156E-01)
-X( 7) = (  6.88801025267267E-01,  3.94152999316655E+00)
-X( 8) = ( -4.06296944890421E+00,  6.68213220541697E-01)
-
-X( 9) = (  1.08116276194653E-01,  3.25876337386566E-02)
-
-PATH NUMBER =        88
-
-ARCLEN =  4.42651770125020E+00
-NFE =  135
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.00317850178806E-13
-SOLUTION AT INFINITY
-
-X( 1) = ( -1.06086908669742E+01, -1.98307686123315E+01)
-X( 2) = (  1.36302571362260E+01,  1.09596546587255E+01)
-X( 3) = ( -2.24548794775887E+13, -1.23384124403717E+14)
-X( 4) = ( -1.23384124403716E+14,  2.24548794775887E+13)
-X( 5) = (  5.75966111419465E+14, -1.60156298530728E+15)
-X( 6) = (  1.60156298530728E+15,  5.75966111419464E+14)
-X( 7) = ( -2.02806100608172E+00, -2.66308782606761E+00)
-X( 8) = ( -3.81055643301601E-01,  4.95242578411274E-01)
-
-X( 9) = (  6.66133814775094E-16,  2.22044604925031E-16)
-
-PATH NUMBER =        89
-
-ARCLEN =  4.82590206006865E+00
-NFE =  143
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.83504189914793E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -1.51219060306653E+00, -1.41556541873182E-01)
-X( 2) = (  3.45954037935140E+00, -2.58589530691772E-01)
-X( 3) = (  5.62300412881267E+12,  2.30140057891963E+13)
-X( 4) = (  2.30140057891966E+13, -5.62300412881313E+12)
-X( 5) = ( -2.94854759030924E+14,  7.01450680803868E+13)
-X( 6) = (  7.01450680803856E+13,  2.94854759030925E+14)
-X( 7) = ( -2.68255472237352E+00,  2.08349843608395E+00)
-X( 8) = ( -3.95091556907297E-01, -1.32995498198202E+00)
-
-X( 9) = (  6.43929354282591E-15, -9.60342916300760E-15)
-
-PATH NUMBER =        90
-
-ARCLEN =  1.21136145545564E+02
-NFE =  375
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.08400854074609E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -1.95867050334786E+13,  1.40568413313627E+13)
-X( 2) = (  1.40568413313601E+13,  1.95867050334764E+13)
-X( 3) = (  1.40674808572873E-02,  4.78711785885013E-02)
-X( 4) = (  1.70752874942256E+00,  2.70578238055060E+00)
-X( 5) = ( -1.47489987298423E+01,  9.17327324843254E+00)
-X( 6) = ( -1.28139710761625E+00, -4.75935239995027E+00)
-X( 7) = ( -3.17499700308289E+13,  1.24655770968222E+13)
-X( 8) = (  1.24655770968217E+13,  3.17499700308301E+13)
-
-X( 9) = ( -1.21014309684142E-14, -1.27120536319580E-14)
-
-PATH NUMBER =        91
-
-ARCLEN =  3.16467050320458E+00
-NFE =  150
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.23242872351499E-17
-FINITE COMPLEX SOLUTION
-
-X( 1) = ( -8.40062525275417E-01,  3.31061653116358E-01)
-X( 2) = (  7.38680181298249E-01,  3.76499187848782E-01)
-X( 3) = (  5.17100724931638E-01,  3.88067038518989E+00)
-X( 4) = (  4.00539746007343E+00, -5.00998337719435E-01)
-X( 5) = ( -1.65699648586207E+00, -5.82716504385727E-02)
-X( 6) = ( -7.30400050240788E-02,  1.32195938335802E+00)
-X( 7) = (  3.73775710005446E+00,  7.06361391302758E-01)
-X( 8) = ( -7.32043054625674E-01,  3.60662844741596E+00)
-
-X( 9) = (  1.53397502113095E-03,  1.24554677971304E-01)
-
-PATH NUMBER =        92
-
-ARCLEN =  5.08719790103552E+00
-NFE =  139
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.07241810334384E-13
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  8.82849248271175E-02, -2.09844535749625E-01)
-X( 2) = (  1.01812160806673E+00,  1.81963617285484E-02)
-X( 3) = (  6.08392880071456E-01,  1.71205029492830E-03)
-X( 4) = ( -7.93638933696725E-01,  1.31243461673300E-03)
-X( 5) = ( -4.22090915226485E-01, -5.75142790295842E-01)
-X( 6) = (  1.09620780507522E+00, -2.21456685144863E-01)
-X( 7) = ( -9.54400887068353E-01,  2.08881184804771E-02)
-X( 8) = (  3.06255751857232E-01,  6.50947408694903E-02)
-
-X( 9) = ( -4.21938521942145E-01, -1.68882671176805E-01)
-
-PATH NUMBER =        93
-
-ARCLEN =  7.11678604767963E+00
-NFE =  157
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.16775785233833E-17
-FINITE COMPLEX SOLUTION
-
-X( 1) = (  1.16805813859714E+00, -2.64606830344746E-01)
-X( 2) = (  4.41763649679255E-01,  6.99641452928462E-01)
-X( 3) = (  2.18650479698318E+00, -2.11047855621063E+00)
-X( 4) = ( -2.22789002770865E+00, -2.07127435811125E+00)
-X( 5) = (  1.11182382946579E+00,  1.91784047471523E-01)
-X( 6) = (  3.68368798447796E-01, -5.78849443787668E-01)
-X( 7) = ( -1.37945707030438E+00,  1.76735543503195E+00)
-X( 8) = (  1.94659755754041E+00,  1.25243707470597E+00)
-
-X( 9) = ( -1.22327497107076E-01, -1.12118299677655E-01)
-
-PATH NUMBER =        94
-
-ARCLEN =  2.88144606901562E+00
-NFE =  112
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.38542922981478E-12
-SOLUTION AT INFINITY
-
-X( 1) = ( -5.66556521198753E+00,  8.86033342605394E+00)
-X( 2) = (  1.90351246613945E+00, -8.72969554899941E+00)
-X( 3) = ( -8.79810424311229E+13,  3.83558972281281E+13)
-X( 4) = (  3.83558972281282E+13,  8.79810424311228E+13)
-X( 5) = (  5.16393066474753E+14,  1.06406401608209E+15)
-X( 6) = (  1.06406401608209E+15, -5.16393066474750E+14)
-X( 7) = ( -1.84534918340363E+00,  1.80003823726258E+00)
-X( 8) = ( -1.14562973200857E+00, -6.33063425087344E-01)
-
-X( 9) = (  1.77635683940025E-15,  2.77555756156289E-16)
-
-PATH NUMBER =        95
-
-ARCLEN =  1.18342616897055E+01
-NFE =  173
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.00150643219412E-14
-SOLUTION AT INFINITY
-
-X( 1) = ( -1.14415968445970E+14,  8.19865999163255E+13)
-X( 2) = (  8.19865999163271E+13,  1.14415968445970E+14)
-X( 3) = ( -3.96742761773501E-01,  5.79422491562082E-01)
-X( 4) = (  8.13685552820262E-01, -5.78781969816393E-01)
-X( 5) = ( -1.32961413129200E+14, -1.48317722604228E+14)
-X( 6) = (  1.48317722604225E+14, -1.32961413129200E+14)
-X( 7) = ( -1.28365538895487E+00, -4.42062368420486E-01)
-X( 8) = ( -4.26803153596995E-01,  8.35598846734207E-02)
-
-X( 9) = ( -7.77156117237610E-16,  2.55351295663786E-15)
-
-PATH NUMBER =        96
-
-ARCLEN =  5.37226931158925E+00
-NFE =  124
-IFLAG2 = 21
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.10211448456360E-14
-SOLUTION AT INFINITY
-
-X( 1) = ( -4.03577546969337E+13,  1.89567340296310E+14)
-X( 2) = (  1.89567340296310E+14,  4.03577546969339E+13)
-X( 3) = (  5.62468517046363E-02,  3.67251678158254E-02)
-X( 4) = (  7.47570931309611E-01,  3.49403289858053E-01)
-X( 5) = (  1.56056832698916E+00,  2.35482851639290E+00)
-X( 6) = ( -1.00569963629719E-01,  2.26867127257739E-01)
-X( 7) = (  1.21275396906372E+14, -2.45936774762315E+14)
-X( 8) = ( -2.45936774762315E+14, -1.21275396906372E+14)
-
-X( 9) = ( -8.88178419700125E-16,  8.88178419700125E-16)
-
-=========Number of processors used:      2  ========
-Bezout GLP number (BGLP)          :     96
-Number of finite solutions        :     48
-Number of finite real solutions   :     12
-Number of finite complex solutions:     36
-Number of solutions at infinity   :     48
-Number of homotopy path failures  :      0
-Maximum running time              :   7.161E+00 secs
-====================================================
-
-
-
- CS6 DESIGN PROBLEM: FIVE QUADRICS, NO SOLUTIONS AT INFINITY, 26 REAL
-SOLUTIONS.
-
-TRACKTOL, FINALTOL =  1.00000000000000E-04  1.00000000000000E-14
-SINGTOL (0 SETS DEFAULT) =  1.49011611938477E-08
-SSPAR(5) (0 SETS DEFAULT) =  1.00000000000000E+00
-NUMBER OF EQUATIONS =  5
-
-===== PROCESSOR    1 TRACKED      0 PATHS IN    7.844E-01 secs =====
-
-===== PROCESSOR    2 TRACKED     26 PATHS IN    7.843E-01 secs =====
-
-PATH NUMBER =         1
-
-ARCLEN =  4.07138265389189E+01
-NFE =  109
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.08465068790678E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  1.16389927287688E+00, -3.83108070557437E-17)
-X( 2) = ( -7.63859205914171E-01,  2.79347201696557E-17)
-X( 3) = (  1.94844080867340E+00, -6.09504527571321E-17)
-X( 4) = ( -9.55623158138963E+00,  4.51886406689408E-16)
-X( 5) = ( -1.01019196038586E+01,  3.23763216093574E-16)
-
-X( 6) = ( -1.53696065157360E+00, -1.52983993723416E-18)
-
-PATH NUMBER =         2
-
-ARCLEN =  3.14856092184633E+00
-NFE =   64
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.11188478839881E-18
-FINITE REAL SOLUTION
-
-X( 1) = (  1.41501326691501E-01, -5.32272044064949E-17)
-X( 2) = ( -1.16041338139256E+00, -1.36631515074702E-16)
-X( 3) = (  1.31686079309314E+01, -1.08494291984827E-15)
-X( 4) = (  6.61174387316089E+00, -4.27691638989545E-16)
-X( 5) = (  6.11375642361873E+00, -6.40260923723117E-16)
-
-X( 6) = (  1.98650083548895E-01,  1.58745403883570E-17)
-
-PATH NUMBER =         3
-
-ARCLEN =  5.98816827548035E+01
-NFE =  138
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.33229622465734E-18
-FINITE REAL SOLUTION
-
-X( 1) = (  7.43264645807508E-01, -1.62430966667303E-17)
-X( 2) = ( -2.10736775727203E+00, -9.87453261916861E-17)
-X( 3) = (  2.80682135576996E+00, -4.89470749611999E-17)
-X( 4) = ( -1.79299698703949E+00, -2.86058387433717E-16)
-X( 5) = ( -2.41607656136975E+00, -9.54378595807022E-17)
-
-X( 6) = (  6.41038252767552E-01,  2.04111886764615E-17)
-
-PATH NUMBER =         4
-
-ARCLEN =  3.96168707869863E+00
-NFE =   78
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.19660861578268E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  1.41013124031696E+00, -2.47079702009736E-14)
-X( 2) = (  2.58090114103551E+00, -7.84110848110369E-14)
-X( 3) = ( -1.04850023898580E+00,  6.64967342074859E-14)
-X( 4) = (  8.68279923185792E-01, -6.02839343268414E-14)
-X( 5) = (  4.86277019745402E+00, -1.25426766608240E-13)
-
-X( 6) = ( -3.46090959720492E-01, -5.73637305809684E-15)
-
-PATH NUMBER =         5
-
-ARCLEN =  5.89344822828439E+00
-NFE =   82
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.50441352621212E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  6.71268949049351E+00, -4.28398200392700E-15)
-X( 2) = (  3.31302113494410E+00, -3.29367796106992E-15)
-X( 3) = (  4.92406382618432E+00, -1.62091686877779E-15)
-X( 4) = ( -5.95369210120175E+00,  1.86608623593602E-15)
-X( 5) = ( -5.86656157503444E+00,  2.18604748004510E-15)
-
-X( 6) = (  1.49865204295332E-01,  1.02288431850946E-16)
-
-PATH NUMBER =         6
-
-ARCLEN =  5.77898920280330E+01
-NFE =  120
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.19251733652345E-15
-FINITE REAL SOLUTION
-
-X( 1) = ( -2.23288850886915E+00, -1.47935631141856E-16)
-X( 2) = ( -3.17947962174520E+00, -1.21541491079122E-16)
-X( 3) = (  2.04683654762731E+00,  4.05841137939758E-17)
-X( 4) = (  1.78267705858699E+00,  1.32773830467095E-16)
-X( 5) = ( -9.32012992112357E+00, -3.81744738139599E-16)
-
-X( 6) = ( -5.45406153214249E+00,  3.61348106651617E-16)
-
-PATH NUMBER =         7
-
-ARCLEN =  9.13661589339807E+01
-NFE =  186
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.46768511901863E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  2.53024178627843E-01,  8.23288062124706E-17)
-X( 2) = ( -2.08658269654213E+00,  8.68651112010938E-16)
-X( 3) = (  1.95491010303003E+00, -6.46882287190881E-16)
-X( 4) = ( -1.90024851420164E+00,  7.30967845157517E-16)
-X( 5) = ( -2.57129482594607E+00,  8.43317589172884E-16)
-
-X( 6) = (  2.33544493994385E+00,  3.78183532464995E-15)
-
-PATH NUMBER =         8
-
-ARCLEN =  7.55779324371101E+01
-NFE =  164
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.22796695596885E-17
-FINITE REAL SOLUTION
-
-X( 1) = ( -6.65667449935664E-01, -5.81080066130142E-18)
-X( 2) = ( -5.11716389509121E+00, -1.61165528771657E-16)
-X( 3) = (  3.78838314176639E+00, -3.45201448669423E-17)
-X( 4) = ( -3.47042248026424E+00, -2.75099565549044E-16)
-X( 5) = ( -6.52148760318467E+00, -1.15817166750834E-16)
-
-X( 6) = (  4.55064317560186E-01, -6.54134838119831E-18)
-
-PATH NUMBER =         9
-
-ARCLEN =  3.12706657898137E+01
-NFE =  124
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.11304071293868E-18
-FINITE REAL SOLUTION
-
-X( 1) = (  1.02961844299220E+00,  7.29534462906980E-17)
-X( 2) = (  1.63261231628576E+00,  1.57169716099388E-16)
-X( 3) = ( -1.15391143801961E+01, -5.21799755383631E-16)
-X( 4) = (  7.40559456543014E+00,  3.71205284648055E-16)
-X( 5) = ( -2.99416723928123E+00, -2.22032598098254E-17)
-
-X( 6) = ( -3.70725697859879E-01,  7.78137074034759E-18)
-
-PATH NUMBER =        10
-
-ARCLEN =  3.69592014087389E+00
-NFE =   83
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.62477088027513E-15
-FINITE REAL SOLUTION
-
-X( 1) = ( -9.22271273558839E+00,  1.60194418269031E-13)
-X( 2) = ( -8.29579088644243E+00,  9.60811800554285E-14)
-X( 3) = (  8.71555054142751E+00, -1.19159502500914E-13)
-X( 4) = ( -1.59230408114351E+01,  2.32285958971004E-13)
-X( 5) = ( -2.74782286890495E+00,  4.66822599344463E-14)
-
-X( 6) = ( -7.93846686255981E-02, -1.36418790406592E-15)
-
-PATH NUMBER =        11
-
-ARCLEN =  3.48505785739183E+00
-NFE =   81
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.94294512906606E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  2.09277697171016E-01,  1.14183198577690E-15)
-X( 2) = ( -8.10742076647925E-01, -4.37261232617737E-15)
-X( 3) = (  6.22372217159399E-02, -3.08750394129431E-16)
-X( 4) = ( -2.05343702947610E+00, -3.68662212595879E-15)
-X( 5) = (  1.16762959529274E+00, -2.20043700290027E-15)
-
-X( 6) = ( -4.82030421549667E-01, -1.02507854097081E-15)
-
-PATH NUMBER =        12
-
-ARCLEN =  4.84779035644930E+00
-NFE =   89
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.11090715564134E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  2.09277697171018E-01,  1.46360039348534E-15)
-X( 2) = ( -8.10742076647920E-01, -1.05975418940569E-14)
-X( 3) = (  6.22372217159376E-02, -1.10069277658656E-16)
-X( 4) = ( -2.05343702947609E+00, -1.40093535570369E-14)
-X( 5) = (  1.16762959529274E+00,  1.24891314857749E-15)
-
-X( 6) = ( -4.82030421549668E-01, -1.34692959088595E-15)
-
-PATH NUMBER =        13
-
-ARCLEN =  3.16961313674263E+00
-NFE =   77
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.48935132365697E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  2.38771307664842E-01, -3.34277241193193E-17)
-X( 2) = (  9.25993537344816E-01,  1.48382329471695E-17)
-X( 3) = ( -1.38142880652993E+00,  2.19298212423708E-18)
-X( 4) = ( -2.63573720846341E-01, -9.53610331051500E-17)
-X( 5) = (  1.94301283353955E+00, -6.71220908992741E-17)
-
-X( 6) = ( -2.89284909266209E-01,  7.45453456802896E-18)
-
-PATH NUMBER =        14
-
-ARCLEN =  1.35605679027083E+01
-NFE =   95
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.28489209626675E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  7.21529788824308E-01,  1.60991334709619E-17)
-X( 2) = ( -1.00883981692147E+00, -8.55738970840651E-17)
-X( 3) = (  1.70436113206322E+00,  1.69911853638996E-16)
-X( 4) = ( -9.99903338289878E-01, -2.95300757261952E-17)
-X( 5) = ( -1.27515101595923E+00, -1.07594233427447E-16)
-
-X( 6) = (  3.16380731464761E+00, -1.65338568468756E-15)
-
-PATH NUMBER =        15
-
-ARCLEN =  1.63303194537626E+01
-NFE =  111
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  7.90417469076287E-16
-FINITE REAL SOLUTION
-
-X( 1) = (  1.40369734523086E+00,  5.59843171278695E-16)
-X( 2) = ( -1.21756024552520E+00, -1.32990420813738E-15)
-X( 3) = (  1.00349634072348E+00, -2.40942959159219E-16)
-X( 4) = ( -1.01278548652221E+00, -5.54769062124599E-16)
-X( 5) = (  1.81905772546656E-01,  1.95434677172004E-16)
-
-X( 6) = (  9.12081816569705E-01, -1.40787550599470E-15)
-
-PATH NUMBER =        16
-
-ARCLEN =  2.97837248777510E+01
-NFE =  131
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.02103608682757E-16
-FINITE REAL SOLUTION
-
-X( 1) = (  3.80199717853391E-01,  4.76070527313888E-18)
-X( 2) = ( -1.13707930330373E+00,  5.12888890983416E-17)
-X( 3) = (  1.25831259823832E+00, -4.55969436097198E-17)
-X( 4) = ( -1.18712892795293E+00,  8.83824492387278E-17)
-X( 5) = ( -1.51829060260652E+00,  9.19665746923410E-17)
-
-X( 6) = ( -3.13157095772156E+00,  3.39589239752417E-16)
-
-PATH NUMBER =        17
-
-ARCLEN =  4.36518095524231E+00
-NFE =   95
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  1.48815385646611E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  4.32183771417219E-01,  5.06123265552530E-16)
-X( 2) = ( -1.21593002789435E+00, -2.81298287018608E-16)
-X( 3) = (  1.60387595614899E-01, -4.63901083991575E-16)
-X( 4) = ( -1.37644272200582E+00,  4.47977036443095E-16)
-X( 5) = ( -4.61525539026012E-01,  1.56366218288818E-16)
-
-X( 6) = ( -1.23311871409487E+00, -1.56722936098260E-15)
-
-PATH NUMBER =        18
-
-ARCLEN =  1.38877131695868E+01
-NFE =   95
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  3.71339083280436E-18
-FINITE REAL SOLUTION
-
-X( 1) = ( -2.72087845493109E+00,  2.71203954787783E-15)
-X( 2) = (  1.02889279979917E+02, -1.05403163291157E-13)
-X( 3) = (  7.20002549262858E+01, -7.13328913955559E-14)
-X( 4) = (  2.69331585169747E+01, -2.31857566333823E-14)
-X( 5) = (  6.33718313147510E+01, -6.25847147114707E-14)
-
-X( 6) = ( -1.48460091766863E-02, -1.51470432577044E-17)
-
-PATH NUMBER =        19
-
-ARCLEN =  1.63940755165112E+01
-NFE =  104
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.45454259222623E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  8.75141848970658E-01,  9.30147047114971E-17)
-X( 2) = ( -4.12780490464355E+00,  1.82060966211255E-15)
-X( 3) = (  5.39516424881803E+00, -1.88859577537912E-15)
-X( 4) = ( -2.60509977208880E+00,  8.47762825828215E-16)
-X( 5) = ( -4.47912183698301E+00,  1.71841258417371E-15)
-
-X( 6) = (  2.25968773474383E-01,  1.02741493807262E-16)
-
-PATH NUMBER =        20
-
-ARCLEN =  1.01980703697822E+01
-NFE =  102
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  8.23848372678137E-18
-FINITE REAL SOLUTION
-
-X( 1) = (  4.35907125088239E-01,  1.21003954094488E-17)
-X( 2) = ( -5.27528394187176E-01, -1.73970573199440E-17)
-X( 3) = ( -9.77842273484617E-02, -9.41673023050646E-17)
-X( 4) = ( -7.65408655983657E-01,  5.49507484015017E-17)
-X( 5) = ( -2.02889502763274E-01, -1.33415184454830E-17)
-
-X( 6) = ( -7.76434240951792E-01, -1.39246672641357E-17)
-
-PATH NUMBER =        21
-
-ARCLEN =  3.57672668828522E+00
-NFE =   61
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  9.43720663190539E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  5.10083615016660E+00, -1.79116134735336E-13)
-X( 2) = (  2.96335553479915E+00, -1.09135959508646E-13)
-X( 3) = ( -3.45918640062099E+00,  1.42110153643562E-13)
-X( 4) = (  7.20246429553499E+00, -2.47220244774701E-13)
-X( 5) = (  2.23036521548250E+00, -3.79095043305963E-14)
-
-X( 6) = (  2.11313587801937E-01,  1.05127855405151E-14)
-
-PATH NUMBER =        22
-
-ARCLEN =  1.10952176497856E+02
-NFE =  197
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  4.25079826240451E-17
-FINITE REAL SOLUTION
-
-X( 1) = (  1.26146296645609E+00,  1.55181736022967E-17)
-X( 2) = ( -1.85815978304991E-01,  1.22250195991962E-17)
-X( 3) = (  5.37308263207481E-01, -3.00228545417632E-17)
-X( 4) = ( -1.49510732368805E-01,  4.60851786555552E-17)
-X( 5) = (  4.31187683195672E-01, -6.36597266051804E-18)
-
-X( 6) = (  8.55122991672043E+00, -1.64424538854968E-15)
-
-PATH NUMBER =        23
-
-ARCLEN =  3.26031855174783E+01
-NFE =  120
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  5.95933360410117E-17
-FINITE REAL SOLUTION
-
-X( 1) = ( -1.86532407516204E-01, -1.22016809223611E-17)
-X( 2) = ( -3.09657937773905E+00, -1.11791655091741E-16)
-X( 3) = (  1.27219262000998E+01,  6.39833519408092E-16)
-X( 4) = ( -8.25386553749518E+00, -4.42947920181481E-16)
-X( 5) = (  4.27979860616508E+00,  2.04218222578892E-16)
-
-X( 6) = (  1.17078782207138E+00, -1.40360333733372E-16)
-
-PATH NUMBER =        24
-
-ARCLEN =  2.88975857233857E+00
-NFE =   67
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  6.14132571821782E-16
-FINITE REAL SOLUTION
-
-X( 1) = (  1.05117383691850E+00,  1.24827380664185E-15)
-X( 2) = ( -1.43615305430037E+00,  4.52285823268159E-15)
-X( 3) = (  5.99465740051791E+00,  2.67728833748105E-15)
-X( 4) = (  2.95122354668468E+00,  8.94988720421989E-15)
-X( 5) = ( -3.98240251241531E+00,  4.37844358632934E-16)
-
-X( 6) = (  2.15744931624439E-01, -1.13037608936842E-16)
-
-PATH NUMBER =        25
-
-ARCLEN =  1.32308826315865E+01
-NFE =   62
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.98755028885609E-15
-FINITE REAL SOLUTION
-
-X( 1) = (  4.42535784381442E-01,  3.54727718752585E-15)
-X( 2) = ( -6.06250224419660E+00,  9.84787178676082E-15)
-X( 3) = (  8.58604931324187E+00, -6.74276091898683E-15)
-X( 4) = ( -1.51796201006249E+00,  1.36378187387450E-14)
-X( 5) = ( -5.69042077449769E-01,  2.77021331410628E-14)
-
-X( 6) = (  1.62304723955545E-01,  1.21047001292973E-16)
-
-PATH NUMBER =        26
-
-ARCLEN =  1.02249742430490E+01
-NFE =   79
-IFLAG2 = 11
-LAMBDA =  1.00000000000000E+00, ESTIMATED ERROR =  2.41724690394819E-15
-FINITE REAL SOLUTION
-
-X( 1) = ( -2.40566339774122E-01, -2.99833781059476E-14)
-X( 2) = (  1.71981274766542E+01,  9.80386668097588E-13)
-X( 3) = (  1.52890310037107E+01,  6.82588011573107E-13)
-X( 4) = (  4.65011805613494E+00,  2.60437883229491E-13)
-X( 5) = (  1.28491836227335E+01,  5.99886693487615E-13)
-
-X( 6) = ( -8.40801993623908E-02,  4.43288963391137E-15)
-
-=========Number of processors used:      2  ========
-Bezout GLP number (BGLP)          :     26
-Number of finite solutions        :     26
-Number of finite real solutions   :     26
-Number of finite complex solutions:      0
-Number of solutions at infinity   :      0
-Number of homotopy path failures  :      0
-Maximum running time              :   7.844E-01 secs
-====================================================
-
diff --git a/sandbox/857/PRS10.DAT b/sandbox/857/PRS10.DAT
deleted file mode 100644
index 78eb020..0000000
--- a/sandbox/857/PRS10.DAT
+++ /dev/null
@@ -1,24094 +0,0 @@
-&PROBLEM  NEW_PROBLEM = .TRUE. 
-TITLE = ' Spatial PRS Mechanism 12 Position Synthesis with 18120 Roots and 247968 path tracking.'
-
-TRACKTOL = 1.D-04
-FINALTOL = 1.D-12
-SINGTOL = 0.0
-SSPAR(5) = 1.D+00
-NUMRR = 1
-N = 12
-
-NUM_TERMS(1) = 202
-    DEG(1,1,1) = 0
-    DEG(1,1,2) = 0
-    DEG(1,1,3) = 0
-    DEG(1,1,4) = 0
-    DEG(1,1,5) = 0
-    DEG(1,1,6) = 0
-    DEG(1,1,7) = 0
-    DEG(1,1,8) = 0
-    DEG(1,1,9) = 0
-    DEG(1,1,10) = 0
-    DEG(1,1,11) = 0
-    DEG(1,1,12) = 0
-  COEF(1,1) = (0.8445837082113041, 0)
-    DEG(1,2,1) = 1
-    DEG(1,2,2) = 0
-    DEG(1,2,3) = 0
-    DEG(1,2,4) = 1
-    DEG(1,2,5) = 0
-    DEG(1,2,6) = 0
-    DEG(1,2,7) = 0
-    DEG(1,2,8) = 0
-    DEG(1,2,9) = 0
-    DEG(1,2,10) = 0
-    DEG(1,2,11) = 0
-    DEG(1,2,12) = 0
-  COEF(1,2) = (0.7131134698032066, 0)
-    DEG(1,3,1) = 0
-    DEG(1,3,2) = 1
-    DEG(1,3,3) = 0
-    DEG(1,3,4) = 1
-    DEG(1,3,5) = 0
-    DEG(1,3,6) = 0
-    DEG(1,3,7) = 0
-    DEG(1,3,8) = 0
-    DEG(1,3,9) = 0
-    DEG(1,3,10) = 0
-    DEG(1,3,11) = 0
-    DEG(1,3,12) = 0
-  COEF(1,3) = (-1.0411753365020109, 0)
-    DEG(1,4,1) = 0
-    DEG(1,4,2) = 0
-    DEG(1,4,3) = 1
-    DEG(1,4,4) = 1
-    DEG(1,4,5) = 0
-    DEG(1,4,6) = 0
-    DEG(1,4,7) = 0
-    DEG(1,4,8) = 0
-    DEG(1,4,9) = 0
-    DEG(1,4,10) = 0
-    DEG(1,4,11) = 0
-    DEG(1,4,12) = 0
-  COEF(1,4) = (1.2453933678493359, 0)
-    DEG(1,5,1) = 0
-    DEG(1,5,2) = 0
-    DEG(1,5,3) = 0
-    DEG(1,5,4) = 2
-    DEG(1,5,5) = 0
-    DEG(1,5,6) = 0
-    DEG(1,5,7) = 0
-    DEG(1,5,8) = 0
-    DEG(1,5,9) = 0
-    DEG(1,5,10) = 0
-    DEG(1,5,11) = 0
-    DEG(1,5,12) = 0
-  COEF(1,5) = (-0.3565567349016033, 0)
-    DEG(1,6,1) = 1
-    DEG(1,6,2) = 0
-    DEG(1,6,3) = 0
-    DEG(1,6,4) = 0
-    DEG(1,6,5) = 1
-    DEG(1,6,6) = 0
-    DEG(1,6,7) = 0
-    DEG(1,6,8) = 0
-    DEG(1,6,9) = 0
-    DEG(1,6,10) = 0
-    DEG(1,6,11) = 0
-    DEG(1,6,12) = 0
-  COEF(1,6) = (-1.0411753365020109, 0)
-    DEG(1,7,1) = 0
-    DEG(1,7,2) = 1
-    DEG(1,7,3) = 0
-    DEG(1,7,4) = 0
-    DEG(1,7,5) = 1
-    DEG(1,7,6) = 0
-    DEG(1,7,7) = 0
-    DEG(1,7,8) = 0
-    DEG(1,7,9) = 0
-    DEG(1,7,10) = 0
-    DEG(1,7,11) = 0
-    DEG(1,7,12) = 0
-  COEF(1,7) = (-0.7332516359280576, 0)
-    DEG(1,8,1) = 0
-    DEG(1,8,2) = 0
-    DEG(1,8,3) = 1
-    DEG(1,8,4) = 0
-    DEG(1,8,5) = 1
-    DEG(1,8,6) = 0
-    DEG(1,8,7) = 0
-    DEG(1,8,8) = 0
-    DEG(1,8,9) = 0
-    DEG(1,8,10) = 0
-    DEG(1,8,11) = 0
-    DEG(1,8,12) = 0
-  COEF(1,8) = (1.1248224148893162, 0)
-    DEG(1,9,1) = 0
-    DEG(1,9,2) = 0
-    DEG(1,9,3) = 0
-    DEG(1,9,4) = 1
-    DEG(1,9,5) = 1
-    DEG(1,9,6) = 0
-    DEG(1,9,7) = 0
-    DEG(1,9,8) = 0
-    DEG(1,9,9) = 0
-    DEG(1,9,10) = 0
-    DEG(1,9,11) = 0
-    DEG(1,9,12) = 0
-  COEF(1,9) = (1.0411753365020109, 0)
-    DEG(1,10,1) = 0
-    DEG(1,10,2) = 0
-    DEG(1,10,3) = 0
-    DEG(1,10,4) = 0
-    DEG(1,10,5) = 2
-    DEG(1,10,6) = 0
-    DEG(1,10,7) = 0
-    DEG(1,10,8) = 0
-    DEG(1,10,9) = 0
-    DEG(1,10,10) = 0
-    DEG(1,10,11) = 0
-    DEG(1,10,12) = 0
-  COEF(1,10) = (0.3666258179640288, 0)
-    DEG(1,11,1) = 1
-    DEG(1,11,2) = 0
-    DEG(1,11,3) = 0
-    DEG(1,11,4) = 0
-    DEG(1,11,5) = 0
-    DEG(1,11,6) = 1
-    DEG(1,11,7) = 0
-    DEG(1,11,8) = 0
-    DEG(1,11,9) = 0
-    DEG(1,11,10) = 0
-    DEG(1,11,11) = 0
-    DEG(1,11,12) = 0
-  COEF(1,11) = (1.2453933678493359, 0)
-    DEG(1,12,1) = 0
-    DEG(1,12,2) = 1
-    DEG(1,12,3) = 0
-    DEG(1,12,4) = 0
-    DEG(1,12,5) = 0
-    DEG(1,12,6) = 1
-    DEG(1,12,7) = 0
-    DEG(1,12,8) = 0
-    DEG(1,12,9) = 0
-    DEG(1,12,10) = 0
-    DEG(1,12,11) = 0
-    DEG(1,12,12) = 0
-  COEF(1,12) = (1.1248224148893162, 0)
-    DEG(1,13,1) = 0
-    DEG(1,13,2) = 0
-    DEG(1,13,3) = 1
-    DEG(1,13,4) = 0
-    DEG(1,13,5) = 0
-    DEG(1,13,6) = 1
-    DEG(1,13,7) = 0
-    DEG(1,13,8) = 0
-    DEG(1,13,9) = 0
-    DEG(1,13,10) = 0
-    DEG(1,13,11) = 0
-    DEG(1,13,12) = 0
-  COEF(1,13) = (-1.669029250297757, 0)
-    DEG(1,14,1) = 0
-    DEG(1,14,2) = 0
-    DEG(1,14,3) = 0
-    DEG(1,14,4) = 1
-    DEG(1,14,5) = 0
-    DEG(1,14,6) = 1
-    DEG(1,14,7) = 0
-    DEG(1,14,8) = 0
-    DEG(1,14,9) = 0
-    DEG(1,14,10) = 0
-    DEG(1,14,11) = 0
-    DEG(1,14,12) = 0
-  COEF(1,14) = (-1.2453933678493359, 0)
-    DEG(1,15,1) = 0
-    DEG(1,15,2) = 0
-    DEG(1,15,3) = 0
-    DEG(1,15,4) = 0
-    DEG(1,15,5) = 1
-    DEG(1,15,6) = 1
-    DEG(1,15,7) = 0
-    DEG(1,15,8) = 0
-    DEG(1,15,9) = 0
-    DEG(1,15,10) = 0
-    DEG(1,15,11) = 0
-    DEG(1,15,12) = 0
-  COEF(1,15) = (-1.1248224148893162, 0)
-    DEG(1,16,1) = 0
-    DEG(1,16,2) = 0
-    DEG(1,16,3) = 0
-    DEG(1,16,4) = 0
-    DEG(1,16,5) = 0
-    DEG(1,16,6) = 2
-    DEG(1,16,7) = 0
-    DEG(1,16,8) = 0
-    DEG(1,16,9) = 0
-    DEG(1,16,10) = 0
-    DEG(1,16,11) = 0
-    DEG(1,16,12) = 0
-  COEF(1,16) = (0.8345146251488785, 0)
-    DEG(1,17,1) = 0
-    DEG(1,17,2) = 0
-    DEG(1,17,3) = 0
-    DEG(1,17,4) = 0
-    DEG(1,17,5) = 0
-    DEG(1,17,6) = 0
-    DEG(1,17,7) = 1
-    DEG(1,17,8) = 0
-    DEG(1,17,9) = 0
-    DEG(1,17,10) = 0
-    DEG(1,17,11) = 0
-    DEG(1,17,12) = 0
-  COEF(1,17) = (-1.8885876008571807, 0)
-    DEG(1,18,1) = 1
-    DEG(1,18,2) = 0
-    DEG(1,18,3) = 0
-    DEG(1,18,4) = 1
-    DEG(1,18,5) = 0
-    DEG(1,18,6) = 0
-    DEG(1,18,7) = 1
-    DEG(1,18,8) = 0
-    DEG(1,18,9) = 0
-    DEG(1,18,10) = 0
-    DEG(1,18,11) = 0
-    DEG(1,18,12) = 0
-  COEF(1,18) = (5.666773546108352, 0)
-    DEG(1,19,1) = 0
-    DEG(1,19,2) = 1
-    DEG(1,19,3) = 0
-    DEG(1,19,4) = 1
-    DEG(1,19,5) = 0
-    DEG(1,19,6) = 0
-    DEG(1,19,7) = 1
-    DEG(1,19,8) = 0
-    DEG(1,19,9) = 0
-    DEG(1,19,10) = 0
-    DEG(1,19,11) = 0
-    DEG(1,19,12) = 0
-  COEF(1,19) = (0.5586796428407328, 0)
-    DEG(1,20,1) = 0
-    DEG(1,20,2) = 0
-    DEG(1,20,3) = 1
-    DEG(1,20,4) = 1
-    DEG(1,20,5) = 0
-    DEG(1,20,6) = 0
-    DEG(1,20,7) = 1
-    DEG(1,20,8) = 0
-    DEG(1,20,9) = 0
-    DEG(1,20,10) = 0
-    DEG(1,20,11) = 0
-    DEG(1,20,12) = 0
-  COEF(1,20) = (-1.35397876921606, 0)
-    DEG(1,21,1) = 0
-    DEG(1,21,2) = 0
-    DEG(1,21,3) = 0
-    DEG(1,21,4) = 2
-    DEG(1,21,5) = 0
-    DEG(1,21,6) = 0
-    DEG(1,21,7) = 1
-    DEG(1,21,8) = 0
-    DEG(1,21,9) = 0
-    DEG(1,21,10) = 0
-    DEG(1,21,11) = 0
-    DEG(1,21,12) = 0
-  COEF(1,21) = (-2.833386773054176, 0)
-    DEG(1,22,1) = 1
-    DEG(1,22,2) = 0
-    DEG(1,22,3) = 0
-    DEG(1,22,4) = 0
-    DEG(1,22,5) = 1
-    DEG(1,22,6) = 0
-    DEG(1,22,7) = 1
-    DEG(1,22,8) = 0
-    DEG(1,22,9) = 0
-    DEG(1,22,10) = 0
-    DEG(1,22,11) = 0
-    DEG(1,22,12) = 0
-  COEF(1,22) = (0.5586796428407328, 0)
-    DEG(1,23,1) = 0
-    DEG(1,23,2) = 1
-    DEG(1,23,3) = 0
-    DEG(1,23,4) = 0
-    DEG(1,23,5) = 1
-    DEG(1,23,6) = 0
-    DEG(1,23,7) = 1
-    DEG(1,23,8) = 0
-    DEG(1,23,9) = 0
-    DEG(1,23,10) = 0
-    DEG(1,23,11) = 0
-    DEG(1,23,12) = 0
-  COEF(1,23) = (-1.837843401712109, 0)
-    DEG(1,24,1) = 0
-    DEG(1,24,2) = 0
-    DEG(1,24,3) = 1
-    DEG(1,24,4) = 0
-    DEG(1,24,5) = 1
-    DEG(1,24,6) = 0
-    DEG(1,24,7) = 1
-    DEG(1,24,8) = 0
-    DEG(1,24,9) = 0
-    DEG(1,24,10) = 0
-    DEG(1,24,11) = 0
-    DEG(1,24,12) = 0
-  COEF(1,24) = (1.2408324417831953, 0)
-    DEG(1,25,1) = 0
-    DEG(1,25,2) = 0
-    DEG(1,25,3) = 0
-    DEG(1,25,4) = 1
-    DEG(1,25,5) = 1
-    DEG(1,25,6) = 0
-    DEG(1,25,7) = 1
-    DEG(1,25,8) = 0
-    DEG(1,25,9) = 0
-    DEG(1,25,10) = 0
-    DEG(1,25,11) = 0
-    DEG(1,25,12) = 0
-  COEF(1,25) = (-0.5586796428407328, 0)
-    DEG(1,26,1) = 0
-    DEG(1,26,2) = 0
-    DEG(1,26,3) = 0
-    DEG(1,26,4) = 0
-    DEG(1,26,5) = 2
-    DEG(1,26,6) = 0
-    DEG(1,26,7) = 1
-    DEG(1,26,8) = 0
-    DEG(1,26,9) = 0
-    DEG(1,26,10) = 0
-    DEG(1,26,11) = 0
-    DEG(1,26,12) = 0
-  COEF(1,26) = (0.9189217008560545, 0)
-    DEG(1,27,1) = 1
-    DEG(1,27,2) = 0
-    DEG(1,27,3) = 0
-    DEG(1,27,4) = 0
-    DEG(1,27,5) = 0
-    DEG(1,27,6) = 1
-    DEG(1,27,7) = 1
-    DEG(1,27,8) = 0
-    DEG(1,27,9) = 0
-    DEG(1,27,10) = 0
-    DEG(1,27,11) = 0
-    DEG(1,27,12) = 0
-  COEF(1,27) = (-1.35397876921606, 0)
-    DEG(1,28,1) = 0
-    DEG(1,28,2) = 1
-    DEG(1,28,3) = 0
-    DEG(1,28,4) = 0
-    DEG(1,28,5) = 0
-    DEG(1,28,6) = 1
-    DEG(1,28,7) = 1
-    DEG(1,28,8) = 0
-    DEG(1,28,9) = 0
-    DEG(1,28,10) = 0
-    DEG(1,28,11) = 0
-    DEG(1,28,12) = 0
-  COEF(1,28) = (1.2408324417831953, 0)
-    DEG(1,29,1) = 0
-    DEG(1,29,2) = 0
-    DEG(1,29,3) = 1
-    DEG(1,29,4) = 0
-    DEG(1,29,5) = 0
-    DEG(1,29,6) = 1
-    DEG(1,29,7) = 1
-    DEG(1,29,8) = 0
-    DEG(1,29,9) = 0
-    DEG(1,29,10) = 0
-    DEG(1,29,11) = 0
-    DEG(1,29,12) = 0
-  COEF(1,29) = (-0.05175494268188179, 0)
-    DEG(1,30,1) = 0
-    DEG(1,30,2) = 0
-    DEG(1,30,3) = 0
-    DEG(1,30,4) = 1
-    DEG(1,30,5) = 0
-    DEG(1,30,6) = 1
-    DEG(1,30,7) = 1
-    DEG(1,30,8) = 0
-    DEG(1,30,9) = 0
-    DEG(1,30,10) = 0
-    DEG(1,30,11) = 0
-    DEG(1,30,12) = 0
-  COEF(1,30) = (1.35397876921606, 0)
-    DEG(1,31,1) = 0
-    DEG(1,31,2) = 0
-    DEG(1,31,3) = 0
-    DEG(1,31,4) = 0
-    DEG(1,31,5) = 1
-    DEG(1,31,6) = 1
-    DEG(1,31,7) = 1
-    DEG(1,31,8) = 0
-    DEG(1,31,9) = 0
-    DEG(1,31,10) = 0
-    DEG(1,31,11) = 0
-    DEG(1,31,12) = 0
-  COEF(1,31) = (-1.2408324417831953, 0)
-    DEG(1,32,1) = 0
-    DEG(1,32,2) = 0
-    DEG(1,32,3) = 0
-    DEG(1,32,4) = 0
-    DEG(1,32,5) = 0
-    DEG(1,32,6) = 2
-    DEG(1,32,7) = 1
-    DEG(1,32,8) = 0
-    DEG(1,32,9) = 0
-    DEG(1,32,10) = 0
-    DEG(1,32,11) = 0
-    DEG(1,32,12) = 0
-  COEF(1,32) = (0.025877471340940896, 0)
-    DEG(1,33,1) = 1
-    DEG(1,33,2) = 0
-    DEG(1,33,3) = 0
-    DEG(1,33,4) = 1
-    DEG(1,33,5) = 0
-    DEG(1,33,6) = 0
-    DEG(1,33,7) = 2
-    DEG(1,33,8) = 0
-    DEG(1,33,9) = 0
-    DEG(1,33,10) = 0
-    DEG(1,33,11) = 0
-    DEG(1,33,12) = 0
-  COEF(1,33) = (0.5969729406783106, 0)
-    DEG(1,34,1) = 0
-    DEG(1,34,2) = 1
-    DEG(1,34,3) = 0
-    DEG(1,34,4) = 1
-    DEG(1,34,5) = 0
-    DEG(1,34,6) = 0
-    DEG(1,34,7) = 2
-    DEG(1,34,8) = 0
-    DEG(1,34,9) = 0
-    DEG(1,34,10) = 0
-    DEG(1,34,11) = 0
-    DEG(1,34,12) = 0
-  COEF(1,34) = (1.8345865847447915, 0)
-    DEG(1,35,1) = 0
-    DEG(1,35,2) = 0
-    DEG(1,35,3) = 1
-    DEG(1,35,4) = 1
-    DEG(1,35,5) = 0
-    DEG(1,35,6) = 0
-    DEG(1,35,7) = 2
-    DEG(1,35,8) = 0
-    DEG(1,35,9) = 0
-    DEG(1,35,10) = 0
-    DEG(1,35,11) = 0
-    DEG(1,35,12) = 0
-  COEF(1,35) = (0.06267691948487343, 0)
-    DEG(1,36,1) = 0
-    DEG(1,36,2) = 0
-    DEG(1,36,3) = 0
-    DEG(1,36,4) = 2
-    DEG(1,36,5) = 0
-    DEG(1,36,6) = 0
-    DEG(1,36,7) = 2
-    DEG(1,36,8) = 0
-    DEG(1,36,9) = 0
-    DEG(1,36,10) = 0
-    DEG(1,36,11) = 0
-    DEG(1,36,12) = 0
-  COEF(1,36) = (-0.2984864703391553, 0)
-    DEG(1,37,1) = 1
-    DEG(1,37,2) = 0
-    DEG(1,37,3) = 0
-    DEG(1,37,4) = 0
-    DEG(1,37,5) = 1
-    DEG(1,37,6) = 0
-    DEG(1,37,7) = 2
-    DEG(1,37,8) = 0
-    DEG(1,37,9) = 0
-    DEG(1,37,10) = 0
-    DEG(1,37,11) = 0
-    DEG(1,37,12) = 0
-  COEF(1,37) = (1.8345865847447915, 0)
-    DEG(1,38,1) = 0
-    DEG(1,38,2) = 1
-    DEG(1,38,3) = 0
-    DEG(1,38,4) = 0
-    DEG(1,38,5) = 1
-    DEG(1,38,6) = 0
-    DEG(1,38,7) = 2
-    DEG(1,38,8) = 0
-    DEG(1,38,9) = 0
-    DEG(1,38,10) = 0
-    DEG(1,38,11) = 0
-    DEG(1,38,12) = 0
-  COEF(1,38) = (-0.6004702124994971, 0)
-    DEG(1,39,1) = 0
-    DEG(1,39,2) = 0
-    DEG(1,39,3) = 1
-    DEG(1,39,4) = 0
-    DEG(1,39,5) = 1
-    DEG(1,39,6) = 0
-    DEG(1,39,7) = 2
-    DEG(1,39,8) = 0
-    DEG(1,39,9) = 0
-    DEG(1,39,10) = 0
-    DEG(1,39,11) = 0
-    DEG(1,39,12) = 0
-  COEF(1,39) = (0.05392641160173372, 0)
-    DEG(1,40,1) = 0
-    DEG(1,40,2) = 0
-    DEG(1,40,3) = 0
-    DEG(1,40,4) = 1
-    DEG(1,40,5) = 1
-    DEG(1,40,6) = 0
-    DEG(1,40,7) = 2
-    DEG(1,40,8) = 0
-    DEG(1,40,9) = 0
-    DEG(1,40,10) = 0
-    DEG(1,40,11) = 0
-    DEG(1,40,12) = 0
-  COEF(1,40) = (-1.8345865847447915, 0)
-    DEG(1,41,1) = 0
-    DEG(1,41,2) = 0
-    DEG(1,41,3) = 0
-    DEG(1,41,4) = 0
-    DEG(1,41,5) = 2
-    DEG(1,41,6) = 0
-    DEG(1,41,7) = 2
-    DEG(1,41,8) = 0
-    DEG(1,41,9) = 0
-    DEG(1,41,10) = 0
-    DEG(1,41,11) = 0
-    DEG(1,41,12) = 0
-  COEF(1,41) = (0.30023510624974853, 0)
-    DEG(1,42,1) = 1
-    DEG(1,42,2) = 0
-    DEG(1,42,3) = 0
-    DEG(1,42,4) = 0
-    DEG(1,42,5) = 0
-    DEG(1,42,6) = 1
-    DEG(1,42,7) = 2
-    DEG(1,42,8) = 0
-    DEG(1,42,9) = 0
-    DEG(1,42,10) = 0
-    DEG(1,42,11) = 0
-    DEG(1,42,12) = 0
-  COEF(1,42) = (0.06267691948487343, 0)
-    DEG(1,43,1) = 0
-    DEG(1,43,2) = 1
-    DEG(1,43,3) = 0
-    DEG(1,43,4) = 0
-    DEG(1,43,5) = 0
-    DEG(1,43,6) = 1
-    DEG(1,43,7) = 2
-    DEG(1,43,8) = 0
-    DEG(1,43,9) = 0
-    DEG(1,43,10) = 0
-    DEG(1,43,11) = 0
-    DEG(1,43,12) = 0
-  COEF(1,43) = (0.05392641160173372, 0)
-    DEG(1,44,1) = 0
-    DEG(1,44,2) = 0
-    DEG(1,44,3) = 1
-    DEG(1,44,4) = 0
-    DEG(1,44,5) = 0
-    DEG(1,44,6) = 1
-    DEG(1,44,7) = 2
-    DEG(1,44,8) = 0
-    DEG(1,44,9) = 0
-    DEG(1,44,10) = 0
-    DEG(1,44,11) = 0
-    DEG(1,44,12) = 0
-  COEF(1,44) = (0.003497271821186414, 0)
-    DEG(1,45,1) = 0
-    DEG(1,45,2) = 0
-    DEG(1,45,3) = 0
-    DEG(1,45,4) = 1
-    DEG(1,45,5) = 0
-    DEG(1,45,6) = 1
-    DEG(1,45,7) = 2
-    DEG(1,45,8) = 0
-    DEG(1,45,9) = 0
-    DEG(1,45,10) = 0
-    DEG(1,45,11) = 0
-    DEG(1,45,12) = 0
-  COEF(1,45) = (-0.06267691948487343, 0)
-    DEG(1,46,1) = 0
-    DEG(1,46,2) = 0
-    DEG(1,46,3) = 0
-    DEG(1,46,4) = 0
-    DEG(1,46,5) = 1
-    DEG(1,46,6) = 1
-    DEG(1,46,7) = 2
-    DEG(1,46,8) = 0
-    DEG(1,46,9) = 0
-    DEG(1,46,10) = 0
-    DEG(1,46,11) = 0
-    DEG(1,46,12) = 0
-  COEF(1,46) = (-0.05392641160173372, 0)
-    DEG(1,47,1) = 0
-    DEG(1,47,2) = 0
-    DEG(1,47,3) = 0
-    DEG(1,47,4) = 0
-    DEG(1,47,5) = 0
-    DEG(1,47,6) = 2
-    DEG(1,47,7) = 2
-    DEG(1,47,8) = 0
-    DEG(1,47,9) = 0
-    DEG(1,47,10) = 0
-    DEG(1,47,11) = 0
-    DEG(1,47,12) = 0
-  COEF(1,47) = (-0.001748635910593207, 0)
-    DEG(1,48,1) = 0
-    DEG(1,48,2) = 0
-    DEG(1,48,3) = 0
-    DEG(1,48,4) = 0
-    DEG(1,48,5) = 0
-    DEG(1,48,6) = 0
-    DEG(1,48,7) = 0
-    DEG(1,48,8) = 1
-    DEG(1,48,9) = 0
-    DEG(1,48,10) = 0
-    DEG(1,48,11) = 0
-    DEG(1,48,12) = 0
-  COEF(1,48) = (2.5448825592348934, 0)
-    DEG(1,49,1) = 1
-    DEG(1,49,2) = 0
-    DEG(1,49,3) = 0
-    DEG(1,49,4) = 1
-    DEG(1,49,5) = 0
-    DEG(1,49,6) = 0
-    DEG(1,49,7) = 0
-    DEG(1,49,8) = 1
-    DEG(1,49,9) = 0
-    DEG(1,49,10) = 0
-    DEG(1,49,11) = 0
-    DEG(1,49,12) = 0
-  COEF(1,49) = (-1.0280312816350292, 0)
-    DEG(1,50,1) = 0
-    DEG(1,50,2) = 1
-    DEG(1,50,3) = 0
-    DEG(1,50,4) = 1
-    DEG(1,50,5) = 0
-    DEG(1,50,6) = 0
-    DEG(1,50,7) = 0
-    DEG(1,50,8) = 1
-    DEG(1,50,9) = 0
-    DEG(1,50,10) = 0
-    DEG(1,50,11) = 0
-    DEG(1,50,12) = 0
-  COEF(1,50) = (-2.2025826627448604, 0)
-    DEG(1,51,1) = 0
-    DEG(1,51,2) = 0
-    DEG(1,51,3) = 1
-    DEG(1,51,4) = 1
-    DEG(1,51,5) = 0
-    DEG(1,51,6) = 0
-    DEG(1,51,7) = 0
-    DEG(1,51,8) = 1
-    DEG(1,51,9) = 0
-    DEG(1,51,10) = 0
-    DEG(1,51,11) = 0
-    DEG(1,51,12) = 0
-  COEF(1,51) = (3.834718995244529, 0)
-    DEG(1,52,1) = 0
-    DEG(1,52,2) = 0
-    DEG(1,52,3) = 0
-    DEG(1,52,4) = 2
-    DEG(1,52,5) = 0
-    DEG(1,52,6) = 0
-    DEG(1,52,7) = 0
-    DEG(1,52,8) = 1
-    DEG(1,52,9) = 0
-    DEG(1,52,10) = 0
-    DEG(1,52,11) = 0
-    DEG(1,52,12) = 0
-  COEF(1,52) = (0.5140156408175146, 0)
-    DEG(1,53,1) = 1
-    DEG(1,53,2) = 0
-    DEG(1,53,3) = 0
-    DEG(1,53,4) = 0
-    DEG(1,53,5) = 1
-    DEG(1,53,6) = 0
-    DEG(1,53,7) = 0
-    DEG(1,53,8) = 1
-    DEG(1,53,9) = 0
-    DEG(1,53,10) = 0
-    DEG(1,53,11) = 0
-    DEG(1,53,12) = 0
-  COEF(1,53) = (-2.2025826627448604, 0)
-    DEG(1,54,1) = 0
-    DEG(1,54,2) = 1
-    DEG(1,54,3) = 0
-    DEG(1,54,4) = 0
-    DEG(1,54,5) = 1
-    DEG(1,54,6) = 0
-    DEG(1,54,7) = 0
-    DEG(1,54,8) = 1
-    DEG(1,54,9) = 0
-    DEG(1,54,10) = 0
-    DEG(1,54,11) = 0
-    DEG(1,54,12) = 0
-  COEF(1,54) = (-1.1367637388525034, 0)
-    DEG(1,55,1) = 0
-    DEG(1,55,2) = 0
-    DEG(1,55,3) = 1
-    DEG(1,55,4) = 0
-    DEG(1,55,5) = 1
-    DEG(1,55,6) = 0
-    DEG(1,55,7) = 0
-    DEG(1,55,8) = 1
-    DEG(1,55,9) = 0
-    DEG(1,55,10) = 0
-    DEG(1,55,11) = 0
-    DEG(1,55,12) = 0
-  COEF(1,55) = (1.7545063055085686, 0)
-    DEG(1,56,1) = 0
-    DEG(1,56,2) = 0
-    DEG(1,56,3) = 0
-    DEG(1,56,4) = 1
-    DEG(1,56,5) = 1
-    DEG(1,56,6) = 0
-    DEG(1,56,7) = 0
-    DEG(1,56,8) = 1
-    DEG(1,56,9) = 0
-    DEG(1,56,10) = 0
-    DEG(1,56,11) = 0
-    DEG(1,56,12) = 0
-  COEF(1,56) = (2.2025826627448604, 0)
-    DEG(1,57,1) = 0
-    DEG(1,57,2) = 0
-    DEG(1,57,3) = 0
-    DEG(1,57,4) = 0
-    DEG(1,57,5) = 2
-    DEG(1,57,6) = 0
-    DEG(1,57,7) = 0
-    DEG(1,57,8) = 1
-    DEG(1,57,9) = 0
-    DEG(1,57,10) = 0
-    DEG(1,57,11) = 0
-    DEG(1,57,12) = 0
-  COEF(1,57) = (0.5683818694262517, 0)
-    DEG(1,58,1) = 1
-    DEG(1,58,2) = 0
-    DEG(1,58,3) = 0
-    DEG(1,58,4) = 0
-    DEG(1,58,5) = 0
-    DEG(1,58,6) = 1
-    DEG(1,58,7) = 0
-    DEG(1,58,8) = 1
-    DEG(1,58,9) = 0
-    DEG(1,58,10) = 0
-    DEG(1,58,11) = 0
-    DEG(1,58,12) = 0
-  COEF(1,58) = (3.834718995244529, 0)
-    DEG(1,59,1) = 0
-    DEG(1,59,2) = 1
-    DEG(1,59,3) = 0
-    DEG(1,59,4) = 0
-    DEG(1,59,5) = 0
-    DEG(1,59,6) = 1
-    DEG(1,59,7) = 0
-    DEG(1,59,8) = 1
-    DEG(1,59,9) = 0
-    DEG(1,59,10) = 0
-    DEG(1,59,11) = 0
-    DEG(1,59,12) = 0
-  COEF(1,59) = (1.7545063055085686, 0)
-    DEG(1,60,1) = 0
-    DEG(1,60,2) = 0
-    DEG(1,60,3) = 1
-    DEG(1,60,4) = 0
-    DEG(1,60,5) = 0
-    DEG(1,60,6) = 1
-    DEG(1,60,7) = 0
-    DEG(1,60,8) = 1
-    DEG(1,60,9) = 0
-    DEG(1,60,10) = 0
-    DEG(1,60,11) = 0
-    DEG(1,60,12) = 0
-  COEF(1,60) = (-2.9249700979822544, 0)
-    DEG(1,61,1) = 0
-    DEG(1,61,2) = 0
-    DEG(1,61,3) = 0
-    DEG(1,61,4) = 1
-    DEG(1,61,5) = 0
-    DEG(1,61,6) = 1
-    DEG(1,61,7) = 0
-    DEG(1,61,8) = 1
-    DEG(1,61,9) = 0
-    DEG(1,61,10) = 0
-    DEG(1,61,11) = 0
-    DEG(1,61,12) = 0
-  COEF(1,61) = (-3.834718995244529, 0)
-    DEG(1,62,1) = 0
-    DEG(1,62,2) = 0
-    DEG(1,62,3) = 0
-    DEG(1,62,4) = 0
-    DEG(1,62,5) = 1
-    DEG(1,62,6) = 1
-    DEG(1,62,7) = 0
-    DEG(1,62,8) = 1
-    DEG(1,62,9) = 0
-    DEG(1,62,10) = 0
-    DEG(1,62,11) = 0
-    DEG(1,62,12) = 0
-  COEF(1,62) = (-1.7545063055085686, 0)
-    DEG(1,63,1) = 0
-    DEG(1,63,2) = 0
-    DEG(1,63,3) = 0
-    DEG(1,63,4) = 0
-    DEG(1,63,5) = 0
-    DEG(1,63,6) = 2
-    DEG(1,63,7) = 0
-    DEG(1,63,8) = 1
-    DEG(1,63,9) = 0
-    DEG(1,63,10) = 0
-    DEG(1,63,11) = 0
-    DEG(1,63,12) = 0
-  COEF(1,63) = (1.4624850489911272, 0)
-    DEG(1,64,1) = 1
-    DEG(1,64,2) = 0
-    DEG(1,64,3) = 0
-    DEG(1,64,4) = 1
-    DEG(1,64,5) = 0
-    DEG(1,64,6) = 0
-    DEG(1,64,7) = 1
-    DEG(1,64,8) = 1
-    DEG(1,64,9) = 0
-    DEG(1,64,10) = 0
-    DEG(1,64,11) = 0
-    DEG(1,64,12) = 0
-  COEF(1,64) = (2.0355212950563737, 0)
-    DEG(1,65,1) = 0
-    DEG(1,65,2) = 1
-    DEG(1,65,3) = 0
-    DEG(1,65,4) = 1
-    DEG(1,65,5) = 0
-    DEG(1,65,6) = 0
-    DEG(1,65,7) = 1
-    DEG(1,65,8) = 1
-    DEG(1,65,9) = 0
-    DEG(1,65,10) = 0
-    DEG(1,65,11) = 0
-    DEG(1,65,12) = 0
-  COEF(1,65) = (-0.6098658452041644, 0)
-    DEG(1,66,1) = 0
-    DEG(1,66,2) = 0
-    DEG(1,66,3) = 1
-    DEG(1,66,4) = 1
-    DEG(1,66,5) = 0
-    DEG(1,66,6) = 0
-    DEG(1,66,7) = 1
-    DEG(1,66,8) = 1
-    DEG(1,66,9) = 0
-    DEG(1,66,10) = 0
-    DEG(1,66,11) = 0
-    DEG(1,66,12) = 0
-  COEF(1,66) = (0.6708810133681483, 0)
-    DEG(1,67,1) = 0
-    DEG(1,67,2) = 0
-    DEG(1,67,3) = 0
-    DEG(1,67,4) = 2
-    DEG(1,67,5) = 0
-    DEG(1,67,6) = 0
-    DEG(1,67,7) = 1
-    DEG(1,67,8) = 1
-    DEG(1,67,9) = 0
-    DEG(1,67,10) = 0
-    DEG(1,67,11) = 0
-    DEG(1,67,12) = 0
-  COEF(1,67) = (-1.0177606475281868, 0)
-    DEG(1,68,1) = 1
-    DEG(1,68,2) = 0
-    DEG(1,68,3) = 0
-    DEG(1,68,4) = 0
-    DEG(1,68,5) = 1
-    DEG(1,68,6) = 0
-    DEG(1,68,7) = 1
-    DEG(1,68,8) = 1
-    DEG(1,68,9) = 0
-    DEG(1,68,10) = 0
-    DEG(1,68,11) = 0
-    DEG(1,68,12) = 0
-  COEF(1,68) = (-0.6098658452041644, 0)
-    DEG(1,69,1) = 0
-    DEG(1,69,2) = 1
-    DEG(1,69,3) = 0
-    DEG(1,69,4) = 0
-    DEG(1,69,5) = 1
-    DEG(1,69,6) = 0
-    DEG(1,69,7) = 1
-    DEG(1,69,8) = 1
-    DEG(1,69,9) = 0
-    DEG(1,69,10) = 0
-    DEG(1,69,11) = 0
-    DEG(1,69,12) = 0
-  COEF(1,69) = (-2.1659165394569246, 0)
-    DEG(1,70,1) = 0
-    DEG(1,70,2) = 0
-    DEG(1,70,3) = 1
-    DEG(1,70,4) = 0
-    DEG(1,70,5) = 1
-    DEG(1,70,6) = 0
-    DEG(1,70,7) = 1
-    DEG(1,70,8) = 1
-    DEG(1,70,9) = 0
-    DEG(1,70,10) = 0
-    DEG(1,70,11) = 0
-    DEG(1,70,12) = 0
-  COEF(1,70) = (1.8411826484169675, 0)
-    DEG(1,71,1) = 0
-    DEG(1,71,2) = 0
-    DEG(1,71,3) = 0
-    DEG(1,71,4) = 1
-    DEG(1,71,5) = 1
-    DEG(1,71,6) = 0
-    DEG(1,71,7) = 1
-    DEG(1,71,8) = 1
-    DEG(1,71,9) = 0
-    DEG(1,71,10) = 0
-    DEG(1,71,11) = 0
-    DEG(1,71,12) = 0
-  COEF(1,71) = (0.6098658452041644, 0)
-    DEG(1,72,1) = 0
-    DEG(1,72,2) = 0
-    DEG(1,72,3) = 0
-    DEG(1,72,4) = 0
-    DEG(1,72,5) = 2
-    DEG(1,72,6) = 0
-    DEG(1,72,7) = 1
-    DEG(1,72,8) = 1
-    DEG(1,72,9) = 0
-    DEG(1,72,10) = 0
-    DEG(1,72,11) = 0
-    DEG(1,72,12) = 0
-  COEF(1,72) = (1.0829582697284623, 0)
-    DEG(1,73,1) = 1
-    DEG(1,73,2) = 0
-    DEG(1,73,3) = 0
-    DEG(1,73,4) = 0
-    DEG(1,73,5) = 0
-    DEG(1,73,6) = 1
-    DEG(1,73,7) = 1
-    DEG(1,73,8) = 1
-    DEG(1,73,9) = 0
-    DEG(1,73,10) = 0
-    DEG(1,73,11) = 0
-    DEG(1,73,12) = 0
-  COEF(1,73) = (0.6708810133681483, 0)
-    DEG(1,74,1) = 0
-    DEG(1,74,2) = 1
-    DEG(1,74,3) = 0
-    DEG(1,74,4) = 0
-    DEG(1,74,5) = 0
-    DEG(1,74,6) = 1
-    DEG(1,74,7) = 1
-    DEG(1,74,8) = 1
-    DEG(1,74,9) = 0
-    DEG(1,74,10) = 0
-    DEG(1,74,11) = 0
-    DEG(1,74,12) = 0
-  COEF(1,74) = (1.8411826484169675, 0)
-    DEG(1,75,1) = 0
-    DEG(1,75,2) = 0
-    DEG(1,75,3) = 1
-    DEG(1,75,4) = 0
-    DEG(1,75,5) = 0
-    DEG(1,75,6) = 1
-    DEG(1,75,7) = 1
-    DEG(1,75,8) = 1
-    DEG(1,75,9) = 0
-    DEG(1,75,10) = 0
-    DEG(1,75,11) = 0
-    DEG(1,75,12) = 0
-  COEF(1,75) = (0.13039524440055103, 0)
-    DEG(1,76,1) = 0
-    DEG(1,76,2) = 0
-    DEG(1,76,3) = 0
-    DEG(1,76,4) = 1
-    DEG(1,76,5) = 0
-    DEG(1,76,6) = 1
-    DEG(1,76,7) = 1
-    DEG(1,76,8) = 1
-    DEG(1,76,9) = 0
-    DEG(1,76,10) = 0
-    DEG(1,76,11) = 0
-    DEG(1,76,12) = 0
-  COEF(1,76) = (-0.6708810133681483, 0)
-    DEG(1,77,1) = 0
-    DEG(1,77,2) = 0
-    DEG(1,77,3) = 0
-    DEG(1,77,4) = 0
-    DEG(1,77,5) = 1
-    DEG(1,77,6) = 1
-    DEG(1,77,7) = 1
-    DEG(1,77,8) = 1
-    DEG(1,77,9) = 0
-    DEG(1,77,10) = 0
-    DEG(1,77,11) = 0
-    DEG(1,77,12) = 0
-  COEF(1,77) = (-1.8411826484169675, 0)
-    DEG(1,78,1) = 0
-    DEG(1,78,2) = 0
-    DEG(1,78,3) = 0
-    DEG(1,78,4) = 0
-    DEG(1,78,5) = 0
-    DEG(1,78,6) = 2
-    DEG(1,78,7) = 1
-    DEG(1,78,8) = 1
-    DEG(1,78,9) = 0
-    DEG(1,78,10) = 0
-    DEG(1,78,11) = 0
-    DEG(1,78,12) = 0
-  COEF(1,78) = (-0.06519762220027552, 0)
-    DEG(1,79,1) = 1
-    DEG(1,79,2) = 0
-    DEG(1,79,3) = 0
-    DEG(1,79,4) = 1
-    DEG(1,79,5) = 0
-    DEG(1,79,6) = 0
-    DEG(1,79,7) = 0
-    DEG(1,79,8) = 2
-    DEG(1,79,9) = 0
-    DEG(1,79,10) = 0
-    DEG(1,79,11) = 0
-    DEG(1,79,12) = 0
-  COEF(1,79) = (-0.5078600005833039, 0)
-    DEG(1,80,1) = 0
-    DEG(1,80,2) = 1
-    DEG(1,80,3) = 0
-    DEG(1,80,4) = 1
-    DEG(1,80,5) = 0
-    DEG(1,80,6) = 0
-    DEG(1,80,7) = 0
-    DEG(1,80,8) = 2
-    DEG(1,80,9) = 0
-    DEG(1,80,10) = 0
-    DEG(1,80,11) = 0
-    DEG(1,80,12) = 0
-  COEF(1,80) = (-0.6497942649104949, 0)
-    DEG(1,81,1) = 0
-    DEG(1,81,2) = 0
-    DEG(1,81,3) = 1
-    DEG(1,81,4) = 1
-    DEG(1,81,5) = 0
-    DEG(1,81,6) = 0
-    DEG(1,81,7) = 0
-    DEG(1,81,8) = 2
-    DEG(1,81,9) = 0
-    DEG(1,81,10) = 0
-    DEG(1,81,11) = 0
-    DEG(1,81,12) = 0
-  COEF(1,81) = (1.0291614383941976, 0)
-    DEG(1,82,1) = 0
-    DEG(1,82,2) = 0
-    DEG(1,82,3) = 0
-    DEG(1,82,4) = 2
-    DEG(1,82,5) = 0
-    DEG(1,82,6) = 0
-    DEG(1,82,7) = 0
-    DEG(1,82,8) = 2
-    DEG(1,82,9) = 0
-    DEG(1,82,10) = 0
-    DEG(1,82,11) = 0
-    DEG(1,82,12) = 0
-  COEF(1,82) = (0.25393000029165197, 0)
-    DEG(1,83,1) = 1
-    DEG(1,83,2) = 0
-    DEG(1,83,3) = 0
-    DEG(1,83,4) = 0
-    DEG(1,83,5) = 1
-    DEG(1,83,6) = 0
-    DEG(1,83,7) = 0
-    DEG(1,83,8) = 2
-    DEG(1,83,9) = 0
-    DEG(1,83,10) = 0
-    DEG(1,83,11) = 0
-    DEG(1,83,12) = 0
-  COEF(1,83) = (-0.6497942649104949, 0)
-    DEG(1,84,1) = 0
-    DEG(1,84,2) = 1
-    DEG(1,84,3) = 0
-    DEG(1,84,4) = 0
-    DEG(1,84,5) = 1
-    DEG(1,84,6) = 0
-    DEG(1,84,7) = 0
-    DEG(1,84,8) = 2
-    DEG(1,84,9) = 0
-    DEG(1,84,10) = 0
-    DEG(1,84,11) = 0
-    DEG(1,84,12) = 0
-  COEF(1,84) = (-0.1913079913133765, 0)
-    DEG(1,85,1) = 0
-    DEG(1,85,2) = 0
-    DEG(1,85,3) = 1
-    DEG(1,85,4) = 0
-    DEG(1,85,5) = 1
-    DEG(1,85,6) = 0
-    DEG(1,85,7) = 0
-    DEG(1,85,8) = 2
-    DEG(1,85,9) = 0
-    DEG(1,85,10) = 0
-    DEG(1,85,11) = 0
-    DEG(1,85,12) = 0
-  COEF(1,85) = (-0.01830559241117736, 0)
-    DEG(1,86,1) = 0
-    DEG(1,86,2) = 0
-    DEG(1,86,3) = 0
-    DEG(1,86,4) = 1
-    DEG(1,86,5) = 1
-    DEG(1,86,6) = 0
-    DEG(1,86,7) = 0
-    DEG(1,86,8) = 2
-    DEG(1,86,9) = 0
-    DEG(1,86,10) = 0
-    DEG(1,86,11) = 0
-    DEG(1,86,12) = 0
-  COEF(1,86) = (0.6497942649104949, 0)
-    DEG(1,87,1) = 0
-    DEG(1,87,2) = 0
-    DEG(1,87,3) = 0
-    DEG(1,87,4) = 0
-    DEG(1,87,5) = 2
-    DEG(1,87,6) = 0
-    DEG(1,87,7) = 0
-    DEG(1,87,8) = 2
-    DEG(1,87,9) = 0
-    DEG(1,87,10) = 0
-    DEG(1,87,11) = 0
-    DEG(1,87,12) = 0
-  COEF(1,87) = (0.09565399565668825, 0)
-    DEG(1,88,1) = 1
-    DEG(1,88,2) = 0
-    DEG(1,88,3) = 0
-    DEG(1,88,4) = 0
-    DEG(1,88,5) = 0
-    DEG(1,88,6) = 1
-    DEG(1,88,7) = 0
-    DEG(1,88,8) = 2
-    DEG(1,88,9) = 0
-    DEG(1,88,10) = 0
-    DEG(1,88,11) = 0
-    DEG(1,88,12) = 0
-  COEF(1,88) = (1.0291614383941976, 0)
-    DEG(1,89,1) = 0
-    DEG(1,89,2) = 1
-    DEG(1,89,3) = 0
-    DEG(1,89,4) = 0
-    DEG(1,89,5) = 0
-    DEG(1,89,6) = 1
-    DEG(1,89,7) = 0
-    DEG(1,89,8) = 2
-    DEG(1,89,9) = 0
-    DEG(1,89,10) = 0
-    DEG(1,89,11) = 0
-    DEG(1,89,12) = 0
-  COEF(1,89) = (-0.01830559241117736, 0)
-    DEG(1,90,1) = 0
-    DEG(1,90,2) = 0
-    DEG(1,90,3) = 1
-    DEG(1,90,4) = 0
-    DEG(1,90,5) = 0
-    DEG(1,90,6) = 1
-    DEG(1,90,7) = 0
-    DEG(1,90,8) = 2
-    DEG(1,90,9) = 0
-    DEG(1,90,10) = 0
-    DEG(1,90,11) = 0
-    DEG(1,90,12) = 0
-  COEF(1,90) = (0.6991679918966804, 0)
-    DEG(1,91,1) = 0
-    DEG(1,91,2) = 0
-    DEG(1,91,3) = 0
-    DEG(1,91,4) = 1
-    DEG(1,91,5) = 0
-    DEG(1,91,6) = 1
-    DEG(1,91,7) = 0
-    DEG(1,91,8) = 2
-    DEG(1,91,9) = 0
-    DEG(1,91,10) = 0
-    DEG(1,91,11) = 0
-    DEG(1,91,12) = 0
-  COEF(1,91) = (-1.0291614383941976, 0)
-    DEG(1,92,1) = 0
-    DEG(1,92,2) = 0
-    DEG(1,92,3) = 0
-    DEG(1,92,4) = 0
-    DEG(1,92,5) = 1
-    DEG(1,92,6) = 1
-    DEG(1,92,7) = 0
-    DEG(1,92,8) = 2
-    DEG(1,92,9) = 0
-    DEG(1,92,10) = 0
-    DEG(1,92,11) = 0
-    DEG(1,92,12) = 0
-  COEF(1,92) = (0.01830559241117736, 0)
-    DEG(1,93,1) = 0
-    DEG(1,93,2) = 0
-    DEG(1,93,3) = 0
-    DEG(1,93,4) = 0
-    DEG(1,93,5) = 0
-    DEG(1,93,6) = 2
-    DEG(1,93,7) = 0
-    DEG(1,93,8) = 2
-    DEG(1,93,9) = 0
-    DEG(1,93,10) = 0
-    DEG(1,93,11) = 0
-    DEG(1,93,12) = 0
-  COEF(1,93) = (-0.3495839959483402, 0)
-    DEG(1,94,1) = 0
-    DEG(1,94,2) = 0
-    DEG(1,94,3) = 0
-    DEG(1,94,4) = 0
-    DEG(1,94,5) = 0
-    DEG(1,94,6) = 0
-    DEG(1,94,7) = 0
-    DEG(1,94,8) = 0
-    DEG(1,94,9) = 1
-    DEG(1,94,10) = 0
-    DEG(1,94,11) = 0
-    DEG(1,94,12) = 0
-  COEF(1,94) = (-1.0776913721194228, 0)
-    DEG(1,95,1) = 1
-    DEG(1,95,2) = 0
-    DEG(1,95,3) = 0
-    DEG(1,95,4) = 1
-    DEG(1,95,5) = 0
-    DEG(1,95,6) = 0
-    DEG(1,95,7) = 0
-    DEG(1,95,8) = 0
-    DEG(1,95,9) = 1
-    DEG(1,95,10) = 0
-    DEG(1,95,11) = 0
-    DEG(1,95,12) = 0
-  COEF(1,95) = (3.3524146222540945, 0)
-    DEG(1,96,1) = 0
-    DEG(1,96,2) = 1
-    DEG(1,96,3) = 0
-    DEG(1,96,4) = 1
-    DEG(1,96,5) = 0
-    DEG(1,96,6) = 0
-    DEG(1,96,7) = 0
-    DEG(1,96,8) = 0
-    DEG(1,96,9) = 1
-    DEG(1,96,10) = 0
-    DEG(1,96,11) = 0
-    DEG(1,96,12) = 0
-  COEF(1,96) = (-0.2442132701802587, 0)
-    DEG(1,97,1) = 0
-    DEG(1,97,2) = 0
-    DEG(1,97,3) = 1
-    DEG(1,97,4) = 1
-    DEG(1,97,5) = 0
-    DEG(1,97,6) = 0
-    DEG(1,97,7) = 0
-    DEG(1,97,8) = 0
-    DEG(1,97,9) = 1
-    DEG(1,97,10) = 0
-    DEG(1,97,11) = 0
-    DEG(1,97,12) = 0
-  COEF(1,97) = (-0.6862764328193154, 0)
-    DEG(1,98,1) = 0
-    DEG(1,98,2) = 0
-    DEG(1,98,3) = 0
-    DEG(1,98,4) = 2
-    DEG(1,98,5) = 0
-    DEG(1,98,6) = 0
-    DEG(1,98,7) = 0
-    DEG(1,98,8) = 0
-    DEG(1,98,9) = 1
-    DEG(1,98,10) = 0
-    DEG(1,98,11) = 0
-    DEG(1,98,12) = 0
-  COEF(1,98) = (-1.6762073111270472, 0)
-    DEG(1,99,1) = 1
-    DEG(1,99,2) = 0
-    DEG(1,99,3) = 0
-    DEG(1,99,4) = 0
-    DEG(1,99,5) = 1
-    DEG(1,99,6) = 0
-    DEG(1,99,7) = 0
-    DEG(1,99,8) = 0
-    DEG(1,99,9) = 1
-    DEG(1,99,10) = 0
-    DEG(1,99,11) = 0
-    DEG(1,99,12) = 0
-  COEF(1,99) = (-0.2442132701802587, 0)
-    DEG(1,100,1) = 0
-    DEG(1,100,2) = 1
-    DEG(1,100,3) = 0
-    DEG(1,100,4) = 0
-    DEG(1,100,5) = 1
-    DEG(1,100,6) = 0
-    DEG(1,100,7) = 0
-    DEG(1,100,8) = 0
-    DEG(1,100,9) = 1
-    DEG(1,100,10) = 0
-    DEG(1,100,11) = 0
-    DEG(1,100,12) = 0
-  COEF(1,100) = (1.2895941145585568, 0)
-    DEG(1,101,1) = 0
-    DEG(1,101,2) = 0
-    DEG(1,101,3) = 1
-    DEG(1,101,4) = 0
-    DEG(1,101,5) = 1
-    DEG(1,101,6) = 0
-    DEG(1,101,7) = 0
-    DEG(1,101,8) = 0
-    DEG(1,101,9) = 1
-    DEG(1,101,10) = 0
-    DEG(1,101,11) = 0
-    DEG(1,101,12) = 0
-  COEF(1,101) = (0.20025581570675674, 0)
-    DEG(1,102,1) = 0
-    DEG(1,102,2) = 0
-    DEG(1,102,3) = 0
-    DEG(1,102,4) = 1
-    DEG(1,102,5) = 1
-    DEG(1,102,6) = 0
-    DEG(1,102,7) = 0
-    DEG(1,102,8) = 0
-    DEG(1,102,9) = 1
-    DEG(1,102,10) = 0
-    DEG(1,102,11) = 0
-    DEG(1,102,12) = 0
-  COEF(1,102) = (0.2442132701802587, 0)
-    DEG(1,103,1) = 0
-    DEG(1,103,2) = 0
-    DEG(1,103,3) = 0
-    DEG(1,103,4) = 0
-    DEG(1,103,5) = 2
-    DEG(1,103,6) = 0
-    DEG(1,103,7) = 0
-    DEG(1,103,8) = 0
-    DEG(1,103,9) = 1
-    DEG(1,103,10) = 0
-    DEG(1,103,11) = 0
-    DEG(1,103,12) = 0
-  COEF(1,103) = (-0.6447970572792784, 0)
-    DEG(1,104,1) = 1
-    DEG(1,104,2) = 0
-    DEG(1,104,3) = 0
-    DEG(1,104,4) = 0
-    DEG(1,104,5) = 0
-    DEG(1,104,6) = 1
-    DEG(1,104,7) = 0
-    DEG(1,104,8) = 0
-    DEG(1,104,9) = 1
-    DEG(1,104,10) = 0
-    DEG(1,104,11) = 0
-    DEG(1,104,12) = 0
-  COEF(1,104) = (-0.6862764328193154, 0)
-    DEG(1,105,1) = 0
-    DEG(1,105,2) = 1
-    DEG(1,105,3) = 0
-    DEG(1,105,4) = 0
-    DEG(1,105,5) = 0
-    DEG(1,105,6) = 1
-    DEG(1,105,7) = 0
-    DEG(1,105,8) = 0
-    DEG(1,105,9) = 1
-    DEG(1,105,10) = 0
-    DEG(1,105,11) = 0
-    DEG(1,105,12) = 0
-  COEF(1,105) = (0.20025581570675674, 0)
-    DEG(1,106,1) = 0
-    DEG(1,106,2) = 0
-    DEG(1,106,3) = 1
-    DEG(1,106,4) = 0
-    DEG(1,106,5) = 0
-    DEG(1,106,6) = 1
-    DEG(1,106,7) = 0
-    DEG(1,106,8) = 0
-    DEG(1,106,9) = 1
-    DEG(1,106,10) = 0
-    DEG(1,106,11) = 0
-    DEG(1,106,12) = 0
-  COEF(1,106) = (-2.486625992573806, 0)
-    DEG(1,107,1) = 0
-    DEG(1,107,2) = 0
-    DEG(1,107,3) = 0
-    DEG(1,107,4) = 1
-    DEG(1,107,5) = 0
-    DEG(1,107,6) = 1
-    DEG(1,107,7) = 0
-    DEG(1,107,8) = 0
-    DEG(1,107,9) = 1
-    DEG(1,107,10) = 0
-    DEG(1,107,11) = 0
-    DEG(1,107,12) = 0
-  COEF(1,107) = (0.6862764328193154, 0)
-    DEG(1,108,1) = 0
-    DEG(1,108,2) = 0
-    DEG(1,108,3) = 0
-    DEG(1,108,4) = 0
-    DEG(1,108,5) = 1
-    DEG(1,108,6) = 1
-    DEG(1,108,7) = 0
-    DEG(1,108,8) = 0
-    DEG(1,108,9) = 1
-    DEG(1,108,10) = 0
-    DEG(1,108,11) = 0
-    DEG(1,108,12) = 0
-  COEF(1,108) = (-0.20025581570675674, 0)
-    DEG(1,109,1) = 0
-    DEG(1,109,2) = 0
-    DEG(1,109,3) = 0
-    DEG(1,109,4) = 0
-    DEG(1,109,5) = 0
-    DEG(1,109,6) = 2
-    DEG(1,109,7) = 0
-    DEG(1,109,8) = 0
-    DEG(1,109,9) = 1
-    DEG(1,109,10) = 0
-    DEG(1,109,11) = 0
-    DEG(1,109,12) = 0
-  COEF(1,109) = (1.243312996286903, 0)
-    DEG(1,110,1) = 1
-    DEG(1,110,2) = 0
-    DEG(1,110,3) = 0
-    DEG(1,110,4) = 1
-    DEG(1,110,5) = 0
-    DEG(1,110,6) = 0
-    DEG(1,110,7) = 1
-    DEG(1,110,8) = 0
-    DEG(1,110,9) = 1
-    DEG(1,110,10) = 0
-    DEG(1,110,11) = 0
-    DEG(1,110,12) = 0
-  COEF(1,110) = (0.21220959297242703, 0)
-    DEG(1,111,1) = 0
-    DEG(1,111,2) = 1
-    DEG(1,111,3) = 0
-    DEG(1,111,4) = 1
-    DEG(1,111,5) = 0
-    DEG(1,111,6) = 0
-    DEG(1,111,7) = 1
-    DEG(1,111,8) = 0
-    DEG(1,111,9) = 1
-    DEG(1,111,10) = 0
-    DEG(1,111,11) = 0
-    DEG(1,111,12) = 0
-  COEF(1,111) = (-0.9017630242409381, 0)
-    DEG(1,112,1) = 0
-    DEG(1,112,2) = 0
-    DEG(1,112,3) = 1
-    DEG(1,112,4) = 1
-    DEG(1,112,5) = 0
-    DEG(1,112,6) = 0
-    DEG(1,112,7) = 1
-    DEG(1,112,8) = 0
-    DEG(1,112,9) = 1
-    DEG(1,112,10) = 0
-    DEG(1,112,11) = 0
-    DEG(1,112,12) = 0
-  COEF(1,112) = (-1.6984324708715934, 0)
-    DEG(1,113,1) = 0
-    DEG(1,113,2) = 0
-    DEG(1,113,3) = 0
-    DEG(1,113,4) = 2
-    DEG(1,113,5) = 0
-    DEG(1,113,6) = 0
-    DEG(1,113,7) = 1
-    DEG(1,113,8) = 0
-    DEG(1,113,9) = 1
-    DEG(1,113,10) = 0
-    DEG(1,113,11) = 0
-    DEG(1,113,12) = 0
-  COEF(1,113) = (-0.10610479648621352, 0)
-    DEG(1,114,1) = 1
-    DEG(1,114,2) = 0
-    DEG(1,114,3) = 0
-    DEG(1,114,4) = 0
-    DEG(1,114,5) = 1
-    DEG(1,114,6) = 0
-    DEG(1,114,7) = 1
-    DEG(1,114,8) = 0
-    DEG(1,114,9) = 1
-    DEG(1,114,10) = 0
-    DEG(1,114,11) = 0
-    DEG(1,114,12) = 0
-  COEF(1,114) = (-0.9017630242409381, 0)
-    DEG(1,115,1) = 0
-    DEG(1,115,2) = 1
-    DEG(1,115,3) = 0
-    DEG(1,115,4) = 0
-    DEG(1,115,5) = 1
-    DEG(1,115,6) = 0
-    DEG(1,115,7) = 1
-    DEG(1,115,8) = 0
-    DEG(1,115,9) = 1
-    DEG(1,115,10) = 0
-    DEG(1,115,11) = 0
-    DEG(1,115,12) = 0
-  COEF(1,115) = (-0.11461729211816349, 0)
-    DEG(1,116,1) = 0
-    DEG(1,116,2) = 0
-    DEG(1,116,3) = 1
-    DEG(1,116,4) = 0
-    DEG(1,116,5) = 1
-    DEG(1,116,6) = 0
-    DEG(1,116,7) = 1
-    DEG(1,116,8) = 0
-    DEG(1,116,9) = 1
-    DEG(1,116,10) = 0
-    DEG(1,116,11) = 0
-    DEG(1,116,12) = 0
-  COEF(1,116) = (0.5787256603143247, 0)
-    DEG(1,117,1) = 0
-    DEG(1,117,2) = 0
-    DEG(1,117,3) = 0
-    DEG(1,117,4) = 1
-    DEG(1,117,5) = 1
-    DEG(1,117,6) = 0
-    DEG(1,117,7) = 1
-    DEG(1,117,8) = 0
-    DEG(1,117,9) = 1
-    DEG(1,117,10) = 0
-    DEG(1,117,11) = 0
-    DEG(1,117,12) = 0
-  COEF(1,117) = (0.9017630242409381, 0)
-    DEG(1,118,1) = 0
-    DEG(1,118,2) = 0
-    DEG(1,118,3) = 0
-    DEG(1,118,4) = 0
-    DEG(1,118,5) = 2
-    DEG(1,118,6) = 0
-    DEG(1,118,7) = 1
-    DEG(1,118,8) = 0
-    DEG(1,118,9) = 1
-    DEG(1,118,10) = 0
-    DEG(1,118,11) = 0
-    DEG(1,118,12) = 0
-  COEF(1,118) = (0.057308646059081744, 0)
-    DEG(1,119,1) = 1
-    DEG(1,119,2) = 0
-    DEG(1,119,3) = 0
-    DEG(1,119,4) = 0
-    DEG(1,119,5) = 0
-    DEG(1,119,6) = 1
-    DEG(1,119,7) = 1
-    DEG(1,119,8) = 0
-    DEG(1,119,9) = 1
-    DEG(1,119,10) = 0
-    DEG(1,119,11) = 0
-    DEG(1,119,12) = 0
-  COEF(1,119) = (-1.6984324708715934, 0)
-    DEG(1,120,1) = 0
-    DEG(1,120,2) = 1
-    DEG(1,120,3) = 0
-    DEG(1,120,4) = 0
-    DEG(1,120,5) = 0
-    DEG(1,120,6) = 1
-    DEG(1,120,7) = 1
-    DEG(1,120,8) = 0
-    DEG(1,120,9) = 1
-    DEG(1,120,10) = 0
-    DEG(1,120,11) = 0
-    DEG(1,120,12) = 0
-  COEF(1,120) = (0.5787256603143247, 0)
-    DEG(1,121,1) = 0
-    DEG(1,121,2) = 0
-    DEG(1,121,3) = 1
-    DEG(1,121,4) = 0
-    DEG(1,121,5) = 0
-    DEG(1,121,6) = 1
-    DEG(1,121,7) = 1
-    DEG(1,121,8) = 0
-    DEG(1,121,9) = 1
-    DEG(1,121,10) = 0
-    DEG(1,121,11) = 0
-    DEG(1,121,12) = 0
-  COEF(1,121) = (-0.09759230085426354, 0)
-    DEG(1,122,1) = 0
-    DEG(1,122,2) = 0
-    DEG(1,122,3) = 0
-    DEG(1,122,4) = 1
-    DEG(1,122,5) = 0
-    DEG(1,122,6) = 1
-    DEG(1,122,7) = 1
-    DEG(1,122,8) = 0
-    DEG(1,122,9) = 1
-    DEG(1,122,10) = 0
-    DEG(1,122,11) = 0
-    DEG(1,122,12) = 0
-  COEF(1,122) = (1.6984324708715934, 0)
-    DEG(1,123,1) = 0
-    DEG(1,123,2) = 0
-    DEG(1,123,3) = 0
-    DEG(1,123,4) = 0
-    DEG(1,123,5) = 1
-    DEG(1,123,6) = 1
-    DEG(1,123,7) = 1
-    DEG(1,123,8) = 0
-    DEG(1,123,9) = 1
-    DEG(1,123,10) = 0
-    DEG(1,123,11) = 0
-    DEG(1,123,12) = 0
-  COEF(1,123) = (-0.5787256603143247, 0)
-    DEG(1,124,1) = 0
-    DEG(1,124,2) = 0
-    DEG(1,124,3) = 0
-    DEG(1,124,4) = 0
-    DEG(1,124,5) = 0
-    DEG(1,124,6) = 2
-    DEG(1,124,7) = 1
-    DEG(1,124,8) = 0
-    DEG(1,124,9) = 1
-    DEG(1,124,10) = 0
-    DEG(1,124,11) = 0
-    DEG(1,124,12) = 0
-  COEF(1,124) = (0.04879615042713177, 0)
-    DEG(1,125,1) = 1
-    DEG(1,125,2) = 0
-    DEG(1,125,3) = 0
-    DEG(1,125,4) = 1
-    DEG(1,125,5) = 0
-    DEG(1,125,6) = 0
-    DEG(1,125,7) = 0
-    DEG(1,125,8) = 1
-    DEG(1,125,9) = 1
-    DEG(1,125,10) = 0
-    DEG(1,125,11) = 0
-    DEG(1,125,12) = 0
-  COEF(1,125) = (1.3460286827526693, 0)
-    DEG(1,126,1) = 0
-    DEG(1,126,2) = 1
-    DEG(1,126,3) = 0
-    DEG(1,126,4) = 1
-    DEG(1,126,5) = 0
-    DEG(1,126,6) = 0
-    DEG(1,126,7) = 0
-    DEG(1,126,8) = 1
-    DEG(1,126,9) = 1
-    DEG(1,126,10) = 0
-    DEG(1,126,11) = 0
-    DEG(1,126,12) = 0
-  COEF(1,126) = (0.39232974739526993, 0)
-    DEG(1,127,1) = 0
-    DEG(1,127,2) = 0
-    DEG(1,127,3) = 1
-    DEG(1,127,4) = 1
-    DEG(1,127,5) = 0
-    DEG(1,127,6) = 0
-    DEG(1,127,7) = 0
-    DEG(1,127,8) = 1
-    DEG(1,127,9) = 1
-    DEG(1,127,10) = 0
-    DEG(1,127,11) = 0
-    DEG(1,127,12) = 0
-  COEF(1,127) = (0.7623333250126675, 0)
-    DEG(1,128,1) = 0
-    DEG(1,128,2) = 0
-    DEG(1,128,3) = 0
-    DEG(1,128,4) = 2
-    DEG(1,128,5) = 0
-    DEG(1,128,6) = 0
-    DEG(1,128,7) = 0
-    DEG(1,128,8) = 1
-    DEG(1,128,9) = 1
-    DEG(1,128,10) = 0
-    DEG(1,128,11) = 0
-    DEG(1,128,12) = 0
-  COEF(1,128) = (-0.6730143413763346, 0)
-    DEG(1,129,1) = 1
-    DEG(1,129,2) = 0
-    DEG(1,129,3) = 0
-    DEG(1,129,4) = 0
-    DEG(1,129,5) = 1
-    DEG(1,129,6) = 0
-    DEG(1,129,7) = 0
-    DEG(1,129,8) = 1
-    DEG(1,129,9) = 1
-    DEG(1,129,10) = 0
-    DEG(1,129,11) = 0
-    DEG(1,129,12) = 0
-  COEF(1,129) = (0.39232974739526993, 0)
-    DEG(1,130,1) = 0
-    DEG(1,130,2) = 1
-    DEG(1,130,3) = 0
-    DEG(1,130,4) = 0
-    DEG(1,130,5) = 1
-    DEG(1,130,6) = 0
-    DEG(1,130,7) = 0
-    DEG(1,130,8) = 1
-    DEG(1,130,9) = 1
-    DEG(1,130,10) = 0
-    DEG(1,130,11) = 0
-    DEG(1,130,12) = 0
-  COEF(1,130) = (2.16361192664519, 0)
-    DEG(1,131,1) = 0
-    DEG(1,131,2) = 0
-    DEG(1,131,3) = 1
-    DEG(1,131,4) = 0
-    DEG(1,131,5) = 1
-    DEG(1,131,6) = 0
-    DEG(1,131,7) = 0
-    DEG(1,131,8) = 1
-    DEG(1,131,9) = 1
-    DEG(1,131,10) = 0
-    DEG(1,131,11) = 0
-    DEG(1,131,12) = 0
-  COEF(1,131) = (-1.0614908044077895, 0)
-    DEG(1,132,1) = 0
-    DEG(1,132,2) = 0
-    DEG(1,132,3) = 0
-    DEG(1,132,4) = 1
-    DEG(1,132,5) = 1
-    DEG(1,132,6) = 0
-    DEG(1,132,7) = 0
-    DEG(1,132,8) = 1
-    DEG(1,132,9) = 1
-    DEG(1,132,10) = 0
-    DEG(1,132,11) = 0
-    DEG(1,132,12) = 0
-  COEF(1,132) = (-0.39232974739526993, 0)
-    DEG(1,133,1) = 0
-    DEG(1,133,2) = 0
-    DEG(1,133,3) = 0
-    DEG(1,133,4) = 0
-    DEG(1,133,5) = 2
-    DEG(1,133,6) = 0
-    DEG(1,133,7) = 0
-    DEG(1,133,8) = 1
-    DEG(1,133,9) = 1
-    DEG(1,133,10) = 0
-    DEG(1,133,11) = 0
-    DEG(1,133,12) = 0
-  COEF(1,133) = (-1.081805963322595, 0)
-    DEG(1,134,1) = 1
-    DEG(1,134,2) = 0
-    DEG(1,134,3) = 0
-    DEG(1,134,4) = 0
-    DEG(1,134,5) = 0
-    DEG(1,134,6) = 1
-    DEG(1,134,7) = 0
-    DEG(1,134,8) = 1
-    DEG(1,134,9) = 1
-    DEG(1,134,10) = 0
-    DEG(1,134,11) = 0
-    DEG(1,134,12) = 0
-  COEF(1,134) = (0.7623333250126675, 0)
-    DEG(1,135,1) = 0
-    DEG(1,135,2) = 1
-    DEG(1,135,3) = 0
-    DEG(1,135,4) = 0
-    DEG(1,135,5) = 0
-    DEG(1,135,6) = 1
-    DEG(1,135,7) = 0
-    DEG(1,135,8) = 1
-    DEG(1,135,9) = 1
-    DEG(1,135,10) = 0
-    DEG(1,135,11) = 0
-    DEG(1,135,12) = 0
-  COEF(1,135) = (-1.0614908044077895, 0)
-    DEG(1,136,1) = 0
-    DEG(1,136,2) = 0
-    DEG(1,136,3) = 1
-    DEG(1,136,4) = 0
-    DEG(1,136,5) = 0
-    DEG(1,136,6) = 1
-    DEG(1,136,7) = 0
-    DEG(1,136,8) = 1
-    DEG(1,136,9) = 1
-    DEG(1,136,10) = 0
-    DEG(1,136,11) = 0
-    DEG(1,136,12) = 0
-  COEF(1,136) = (-3.509640609397859, 0)
-    DEG(1,137,1) = 0
-    DEG(1,137,2) = 0
-    DEG(1,137,3) = 0
-    DEG(1,137,4) = 1
-    DEG(1,137,5) = 0
-    DEG(1,137,6) = 1
-    DEG(1,137,7) = 0
-    DEG(1,137,8) = 1
-    DEG(1,137,9) = 1
-    DEG(1,137,10) = 0
-    DEG(1,137,11) = 0
-    DEG(1,137,12) = 0
-  COEF(1,137) = (-0.7623333250126675, 0)
-    DEG(1,138,1) = 0
-    DEG(1,138,2) = 0
-    DEG(1,138,3) = 0
-    DEG(1,138,4) = 0
-    DEG(1,138,5) = 1
-    DEG(1,138,6) = 1
-    DEG(1,138,7) = 0
-    DEG(1,138,8) = 1
-    DEG(1,138,9) = 1
-    DEG(1,138,10) = 0
-    DEG(1,138,11) = 0
-    DEG(1,138,12) = 0
-  COEF(1,138) = (1.0614908044077895, 0)
-    DEG(1,139,1) = 0
-    DEG(1,139,2) = 0
-    DEG(1,139,3) = 0
-    DEG(1,139,4) = 0
-    DEG(1,139,5) = 0
-    DEG(1,139,6) = 2
-    DEG(1,139,7) = 0
-    DEG(1,139,8) = 1
-    DEG(1,139,9) = 1
-    DEG(1,139,10) = 0
-    DEG(1,139,11) = 0
-    DEG(1,139,12) = 0
-  COEF(1,139) = (1.7548203046989295, 0)
-    DEG(1,140,1) = 1
-    DEG(1,140,2) = 0
-    DEG(1,140,3) = 0
-    DEG(1,140,4) = 1
-    DEG(1,140,5) = 0
-    DEG(1,140,6) = 0
-    DEG(1,140,7) = 0
-    DEG(1,140,8) = 0
-    DEG(1,140,9) = 2
-    DEG(1,140,10) = 0
-    DEG(1,140,11) = 0
-    DEG(1,140,12) = 0
-  COEF(1,140) = (-0.08911294009500675, 0)
-    DEG(1,141,1) = 0
-    DEG(1,141,2) = 1
-    DEG(1,141,3) = 0
-    DEG(1,141,4) = 1
-    DEG(1,141,5) = 0
-    DEG(1,141,6) = 0
-    DEG(1,141,7) = 0
-    DEG(1,141,8) = 0
-    DEG(1,141,9) = 2
-    DEG(1,141,10) = 0
-    DEG(1,141,11) = 0
-    DEG(1,141,12) = 0
-  COEF(1,141) = (-1.1847923198342967, 0)
-    DEG(1,142,1) = 0
-    DEG(1,142,2) = 0
-    DEG(1,142,3) = 1
-    DEG(1,142,4) = 1
-    DEG(1,142,5) = 0
-    DEG(1,142,6) = 0
-    DEG(1,142,7) = 0
-    DEG(1,142,8) = 0
-    DEG(1,142,9) = 2
-    DEG(1,142,10) = 0
-    DEG(1,142,11) = 0
-    DEG(1,142,12) = 0
-  COEF(1,142) = (-1.0918383578790711, 0)
-    DEG(1,143,1) = 0
-    DEG(1,143,2) = 0
-    DEG(1,143,3) = 0
-    DEG(1,143,4) = 2
-    DEG(1,143,5) = 0
-    DEG(1,143,6) = 0
-    DEG(1,143,7) = 0
-    DEG(1,143,8) = 0
-    DEG(1,143,9) = 2
-    DEG(1,143,10) = 0
-    DEG(1,143,11) = 0
-    DEG(1,143,12) = 0
-  COEF(1,143) = (0.04455647004750338, 0)
-    DEG(1,144,1) = 1
-    DEG(1,144,2) = 0
-    DEG(1,144,3) = 0
-    DEG(1,144,4) = 0
-    DEG(1,144,5) = 1
-    DEG(1,144,6) = 0
-    DEG(1,144,7) = 0
-    DEG(1,144,8) = 0
-    DEG(1,144,9) = 2
-    DEG(1,144,10) = 0
-    DEG(1,144,11) = 0
-    DEG(1,144,12) = 0
-  COEF(1,144) = (-1.1847923198342967, 0)
-    DEG(1,145,1) = 0
-    DEG(1,145,2) = 1
-    DEG(1,145,3) = 0
-    DEG(1,145,4) = 0
-    DEG(1,145,5) = 1
-    DEG(1,145,6) = 0
-    DEG(1,145,7) = 0
-    DEG(1,145,8) = 0
-    DEG(1,145,9) = 2
-    DEG(1,145,10) = 0
-    DEG(1,145,11) = 0
-    DEG(1,145,12) = 0
-  COEF(1,145) = (0.7917782038128736, 0)
-    DEG(1,146,1) = 0
-    DEG(1,146,2) = 0
-    DEG(1,146,3) = 1
-    DEG(1,146,4) = 0
-    DEG(1,146,5) = 1
-    DEG(1,146,6) = 0
-    DEG(1,146,7) = 0
-    DEG(1,146,8) = 0
-    DEG(1,146,9) = 2
-    DEG(1,146,10) = 0
-    DEG(1,146,11) = 0
-    DEG(1,146,12) = 0
-  COEF(1,146) = (-0.03562081919055636, 0)
-    DEG(1,147,1) = 0
-    DEG(1,147,2) = 0
-    DEG(1,147,3) = 0
-    DEG(1,147,4) = 1
-    DEG(1,147,5) = 1
-    DEG(1,147,6) = 0
-    DEG(1,147,7) = 0
-    DEG(1,147,8) = 0
-    DEG(1,147,9) = 2
-    DEG(1,147,10) = 0
-    DEG(1,147,11) = 0
-    DEG(1,147,12) = 0
-  COEF(1,147) = (1.1847923198342967, 0)
-    DEG(1,148,1) = 0
-    DEG(1,148,2) = 0
-    DEG(1,148,3) = 0
-    DEG(1,148,4) = 0
-    DEG(1,148,5) = 2
-    DEG(1,148,6) = 0
-    DEG(1,148,7) = 0
-    DEG(1,148,8) = 0
-    DEG(1,148,9) = 2
-    DEG(1,148,10) = 0
-    DEG(1,148,11) = 0
-    DEG(1,148,12) = 0
-  COEF(1,148) = (-0.3958891019064368, 0)
-    DEG(1,149,1) = 1
-    DEG(1,149,2) = 0
-    DEG(1,149,3) = 0
-    DEG(1,149,4) = 0
-    DEG(1,149,5) = 0
-    DEG(1,149,6) = 1
-    DEG(1,149,7) = 0
-    DEG(1,149,8) = 0
-    DEG(1,149,9) = 2
-    DEG(1,149,10) = 0
-    DEG(1,149,11) = 0
-    DEG(1,149,12) = 0
-  COEF(1,149) = (-1.0918383578790711, 0)
-    DEG(1,150,1) = 0
-    DEG(1,150,2) = 1
-    DEG(1,150,3) = 0
-    DEG(1,150,4) = 0
-    DEG(1,150,5) = 0
-    DEG(1,150,6) = 1
-    DEG(1,150,7) = 0
-    DEG(1,150,8) = 0
-    DEG(1,150,9) = 2
-    DEG(1,150,10) = 0
-    DEG(1,150,11) = 0
-    DEG(1,150,12) = 0
-  COEF(1,150) = (-0.03562081919055636, 0)
-    DEG(1,151,1) = 0
-    DEG(1,151,2) = 0
-    DEG(1,151,3) = 1
-    DEG(1,151,4) = 0
-    DEG(1,151,5) = 0
-    DEG(1,151,6) = 1
-    DEG(1,151,7) = 0
-    DEG(1,151,8) = 0
-    DEG(1,151,9) = 2
-    DEG(1,151,10) = 0
-    DEG(1,151,11) = 0
-    DEG(1,151,12) = 0
-  COEF(1,151) = (-0.7026652637178669, 0)
-    DEG(1,152,1) = 0
-    DEG(1,152,2) = 0
-    DEG(1,152,3) = 0
-    DEG(1,152,4) = 1
-    DEG(1,152,5) = 0
-    DEG(1,152,6) = 1
-    DEG(1,152,7) = 0
-    DEG(1,152,8) = 0
-    DEG(1,152,9) = 2
-    DEG(1,152,10) = 0
-    DEG(1,152,11) = 0
-    DEG(1,152,12) = 0
-  COEF(1,152) = (1.0918383578790711, 0)
-    DEG(1,153,1) = 0
-    DEG(1,153,2) = 0
-    DEG(1,153,3) = 0
-    DEG(1,153,4) = 0
-    DEG(1,153,5) = 1
-    DEG(1,153,6) = 1
-    DEG(1,153,7) = 0
-    DEG(1,153,8) = 0
-    DEG(1,153,9) = 2
-    DEG(1,153,10) = 0
-    DEG(1,153,11) = 0
-    DEG(1,153,12) = 0
-  COEF(1,153) = (0.03562081919055636, 0)
-    DEG(1,154,1) = 0
-    DEG(1,154,2) = 0
-    DEG(1,154,3) = 0
-    DEG(1,154,4) = 0
-    DEG(1,154,5) = 0
-    DEG(1,154,6) = 2
-    DEG(1,154,7) = 0
-    DEG(1,154,8) = 0
-    DEG(1,154,9) = 2
-    DEG(1,154,10) = 0
-    DEG(1,154,11) = 0
-    DEG(1,154,12) = 0
-  COEF(1,154) = (0.35133263185893343, 0)
-    DEG(1,155,1) = 0
-    DEG(1,155,2) = 0
-    DEG(1,155,3) = 0
-    DEG(1,155,4) = 0
-    DEG(1,155,5) = 0
-    DEG(1,155,6) = 0
-    DEG(1,155,7) = 0
-    DEG(1,155,8) = 0
-    DEG(1,155,9) = 0
-    DEG(1,155,10) = 1
-    DEG(1,155,11) = 0
-    DEG(1,155,12) = 0
-  COEF(1,155) = (-0.39959699282564654, 0)
-    DEG(1,156,1) = 1
-    DEG(1,156,2) = 0
-    DEG(1,156,3) = 0
-    DEG(1,156,4) = 1
-    DEG(1,156,5) = 0
-    DEG(1,156,6) = 0
-    DEG(1,156,7) = 0
-    DEG(1,156,8) = 0
-    DEG(1,156,9) = 0
-    DEG(1,156,10) = 1
-    DEG(1,156,11) = 0
-    DEG(1,156,12) = 0
-  COEF(1,156) = (0.39959699282564654, 0)
-    DEG(1,157,1) = 1
-    DEG(1,157,2) = 0
-    DEG(1,157,3) = 0
-    DEG(1,157,4) = 0
-    DEG(1,157,5) = 1
-    DEG(1,157,6) = 0
-    DEG(1,157,7) = 0
-    DEG(1,157,8) = 0
-    DEG(1,157,9) = 0
-    DEG(1,157,10) = 1
-    DEG(1,157,11) = 0
-    DEG(1,157,12) = 0
-  COEF(1,157) = (-1.293763034961273, 0)
-    DEG(1,158,1) = 1
-    DEG(1,158,2) = 0
-    DEG(1,158,3) = 0
-    DEG(1,158,4) = 0
-    DEG(1,158,5) = 0
-    DEG(1,158,6) = 1
-    DEG(1,158,7) = 0
-    DEG(1,158,8) = 0
-    DEG(1,158,9) = 0
-    DEG(1,158,10) = 1
-    DEG(1,158,11) = 0
-    DEG(1,158,12) = 0
-  COEF(1,158) = (1.6256212700376798, 0)
-    DEG(1,159,1) = 0
-    DEG(1,159,2) = 0
-    DEG(1,159,3) = 0
-    DEG(1,159,4) = 0
-    DEG(1,159,5) = 0
-    DEG(1,159,6) = 0
-    DEG(1,159,7) = 1
-    DEG(1,159,8) = 0
-    DEG(1,159,9) = 0
-    DEG(1,159,10) = 1
-    DEG(1,159,11) = 0
-    DEG(1,159,12) = 0
-  COEF(1,159) = (-3.132737846130069, 0)
-    DEG(1,160,1) = 1
-    DEG(1,160,2) = 0
-    DEG(1,160,3) = 0
-    DEG(1,160,4) = 1
-    DEG(1,160,5) = 0
-    DEG(1,160,6) = 0
-    DEG(1,160,7) = 1
-    DEG(1,160,8) = 0
-    DEG(1,160,9) = 0
-    DEG(1,160,10) = 1
-    DEG(1,160,11) = 0
-    DEG(1,160,12) = 0
-  COEF(1,160) = (3.132737846130069, 0)
-    DEG(1,161,1) = 1
-    DEG(1,161,2) = 0
-    DEG(1,161,3) = 0
-    DEG(1,161,4) = 0
-    DEG(1,161,5) = 1
-    DEG(1,161,6) = 0
-    DEG(1,161,7) = 1
-    DEG(1,161,8) = 0
-    DEG(1,161,9) = 0
-    DEG(1,161,10) = 1
-    DEG(1,161,11) = 0
-    DEG(1,161,12) = 0
-  COEF(1,161) = (-0.4997122303274737, 0)
-    DEG(1,162,1) = 1
-    DEG(1,162,2) = 0
-    DEG(1,162,3) = 0
-    DEG(1,162,4) = 0
-    DEG(1,162,5) = 0
-    DEG(1,162,6) = 1
-    DEG(1,162,7) = 1
-    DEG(1,162,8) = 0
-    DEG(1,162,9) = 0
-    DEG(1,162,10) = 1
-    DEG(1,162,11) = 0
-    DEG(1,162,12) = 0
-  COEF(1,162) = (0.10377061920086407, 0)
-    DEG(1,163,1) = 0
-    DEG(1,163,2) = 0
-    DEG(1,163,3) = 0
-    DEG(1,163,4) = 0
-    DEG(1,163,5) = 0
-    DEG(1,163,6) = 0
-    DEG(1,163,7) = 0
-    DEG(1,163,8) = 1
-    DEG(1,163,9) = 0
-    DEG(1,163,10) = 1
-    DEG(1,163,11) = 0
-    DEG(1,163,12) = 0
-  COEF(1,163) = (0.7315179354734475, 0)
-    DEG(1,164,1) = 1
-    DEG(1,164,2) = 0
-    DEG(1,164,3) = 0
-    DEG(1,164,4) = 1
-    DEG(1,164,5) = 0
-    DEG(1,164,6) = 0
-    DEG(1,164,7) = 0
-    DEG(1,164,8) = 1
-    DEG(1,164,9) = 0
-    DEG(1,164,10) = 1
-    DEG(1,164,11) = 0
-    DEG(1,164,12) = 0
-  COEF(1,164) = (-0.7315179354734475, 0)
-    DEG(1,165,1) = 1
-    DEG(1,165,2) = 0
-    DEG(1,165,3) = 0
-    DEG(1,165,4) = 0
-    DEG(1,165,5) = 1
-    DEG(1,165,6) = 0
-    DEG(1,165,7) = 0
-    DEG(1,165,8) = 1
-    DEG(1,165,9) = 0
-    DEG(1,165,10) = 1
-    DEG(1,165,11) = 0
-    DEG(1,165,12) = 0
-  COEF(1,165) = (-1.7572039597435545, 0)
-    DEG(1,166,1) = 1
-    DEG(1,166,2) = 0
-    DEG(1,166,3) = 0
-    DEG(1,166,4) = 0
-    DEG(1,166,5) = 0
-    DEG(1,166,6) = 1
-    DEG(1,166,7) = 0
-    DEG(1,166,8) = 1
-    DEG(1,166,9) = 0
-    DEG(1,166,10) = 1
-    DEG(1,166,11) = 0
-    DEG(1,166,12) = 0
-  COEF(1,166) = (3.195346014299941, 0)
-    DEG(1,167,1) = 0
-    DEG(1,167,2) = 0
-    DEG(1,167,3) = 0
-    DEG(1,167,4) = 0
-    DEG(1,167,5) = 0
-    DEG(1,167,6) = 0
-    DEG(1,167,7) = 0
-    DEG(1,167,8) = 0
-    DEG(1,167,9) = 1
-    DEG(1,167,10) = 1
-    DEG(1,167,11) = 0
-    DEG(1,167,12) = 0
-  COEF(1,167) = (-1.8891062637042868, 0)
-    DEG(1,168,1) = 1
-    DEG(1,168,2) = 0
-    DEG(1,168,3) = 0
-    DEG(1,168,4) = 1
-    DEG(1,168,5) = 0
-    DEG(1,168,6) = 0
-    DEG(1,168,7) = 0
-    DEG(1,168,8) = 0
-    DEG(1,168,9) = 1
-    DEG(1,168,10) = 1
-    DEG(1,168,11) = 0
-    DEG(1,168,12) = 0
-  COEF(1,168) = (1.8891062637042868, 0)
-    DEG(1,169,1) = 1
-    DEG(1,169,2) = 0
-    DEG(1,169,3) = 0
-    DEG(1,169,4) = 0
-    DEG(1,169,5) = 1
-    DEG(1,169,6) = 0
-    DEG(1,169,7) = 0
-    DEG(1,169,8) = 0
-    DEG(1,169,9) = 1
-    DEG(1,169,10) = 1
-    DEG(1,169,11) = 0
-    DEG(1,169,12) = 0
-  COEF(1,169) = (-0.6234913178994591, 0)
-    DEG(1,170,1) = 1
-    DEG(1,170,2) = 0
-    DEG(1,170,3) = 0
-    DEG(1,170,4) = 0
-    DEG(1,170,5) = 0
-    DEG(1,170,6) = 1
-    DEG(1,170,7) = 0
-    DEG(1,170,8) = 0
-    DEG(1,170,9) = 1
-    DEG(1,170,10) = 1
-    DEG(1,170,11) = 0
-    DEG(1,170,12) = 0
-  COEF(1,170) = (0.6160772486418226, 0)
-    DEG(1,171,1) = 0
-    DEG(1,171,2) = 0
-    DEG(1,171,3) = 0
-    DEG(1,171,4) = 0
-    DEG(1,171,5) = 0
-    DEG(1,171,6) = 0
-    DEG(1,171,7) = 0
-    DEG(1,171,8) = 0
-    DEG(1,171,9) = 0
-    DEG(1,171,10) = 0
-    DEG(1,171,11) = 1
-    DEG(1,171,12) = 0
-  COEF(1,171) = (1.293763034961273, 0)
-    DEG(1,172,1) = 0
-    DEG(1,172,2) = 1
-    DEG(1,172,3) = 0
-    DEG(1,172,4) = 1
-    DEG(1,172,5) = 0
-    DEG(1,172,6) = 0
-    DEG(1,172,7) = 0
-    DEG(1,172,8) = 0
-    DEG(1,172,9) = 0
-    DEG(1,172,10) = 0
-    DEG(1,172,11) = 1
-    DEG(1,172,12) = 0
-  COEF(1,172) = (0.39959699282564654, 0)
-    DEG(1,173,1) = 0
-    DEG(1,173,2) = 1
-    DEG(1,173,3) = 0
-    DEG(1,173,4) = 0
-    DEG(1,173,5) = 1
-    DEG(1,173,6) = 0
-    DEG(1,173,7) = 0
-    DEG(1,173,8) = 0
-    DEG(1,173,9) = 0
-    DEG(1,173,10) = 0
-    DEG(1,173,11) = 1
-    DEG(1,173,12) = 0
-  COEF(1,173) = (-1.293763034961273, 0)
-    DEG(1,174,1) = 0
-    DEG(1,174,2) = 1
-    DEG(1,174,3) = 0
-    DEG(1,174,4) = 0
-    DEG(1,174,5) = 0
-    DEG(1,174,6) = 1
-    DEG(1,174,7) = 0
-    DEG(1,174,8) = 0
-    DEG(1,174,9) = 0
-    DEG(1,174,10) = 0
-    DEG(1,174,11) = 1
-    DEG(1,174,12) = 0
-  COEF(1,174) = (1.6256212700376798, 0)
-    DEG(1,175,1) = 0
-    DEG(1,175,2) = 0
-    DEG(1,175,3) = 0
-    DEG(1,175,4) = 0
-    DEG(1,175,5) = 0
-    DEG(1,175,6) = 0
-    DEG(1,175,7) = 1
-    DEG(1,175,8) = 0
-    DEG(1,175,9) = 0
-    DEG(1,175,10) = 0
-    DEG(1,175,11) = 1
-    DEG(1,175,12) = 0
-  COEF(1,175) = (0.4997122303274737, 0)
-    DEG(1,176,1) = 0
-    DEG(1,176,2) = 1
-    DEG(1,176,3) = 0
-    DEG(1,176,4) = 1
-    DEG(1,176,5) = 0
-    DEG(1,176,6) = 0
-    DEG(1,176,7) = 1
-    DEG(1,176,8) = 0
-    DEG(1,176,9) = 0
-    DEG(1,176,10) = 0
-    DEG(1,176,11) = 1
-    DEG(1,176,12) = 0
-  COEF(1,176) = (3.132737846130069, 0)
-    DEG(1,177,1) = 0
-    DEG(1,177,2) = 1
-    DEG(1,177,3) = 0
-    DEG(1,177,4) = 0
-    DEG(1,177,5) = 1
-    DEG(1,177,6) = 0
-    DEG(1,177,7) = 1
-    DEG(1,177,8) = 0
-    DEG(1,177,9) = 0
-    DEG(1,177,10) = 0
-    DEG(1,177,11) = 1
-    DEG(1,177,12) = 0
-  COEF(1,177) = (-0.4997122303274737, 0)
-    DEG(1,178,1) = 0
-    DEG(1,178,2) = 1
-    DEG(1,178,3) = 0
-    DEG(1,178,4) = 0
-    DEG(1,178,5) = 0
-    DEG(1,178,6) = 1
-    DEG(1,178,7) = 1
-    DEG(1,178,8) = 0
-    DEG(1,178,9) = 0
-    DEG(1,178,10) = 0
-    DEG(1,178,11) = 1
-    DEG(1,178,12) = 0
-  COEF(1,178) = (0.10377061920086407, 0)
-    DEG(1,179,1) = 0
-    DEG(1,179,2) = 0
-    DEG(1,179,3) = 0
-    DEG(1,179,4) = 0
-    DEG(1,179,5) = 0
-    DEG(1,179,6) = 0
-    DEG(1,179,7) = 0
-    DEG(1,179,8) = 1
-    DEG(1,179,9) = 0
-    DEG(1,179,10) = 0
-    DEG(1,179,11) = 1
-    DEG(1,179,12) = 0
-  COEF(1,179) = (1.7572039597435545, 0)
-    DEG(1,180,1) = 0
-    DEG(1,180,2) = 1
-    DEG(1,180,3) = 0
-    DEG(1,180,4) = 1
-    DEG(1,180,5) = 0
-    DEG(1,180,6) = 0
-    DEG(1,180,7) = 0
-    DEG(1,180,8) = 1
-    DEG(1,180,9) = 0
-    DEG(1,180,10) = 0
-    DEG(1,180,11) = 1
-    DEG(1,180,12) = 0
-  COEF(1,180) = (-0.7315179354734475, 0)
-    DEG(1,181,1) = 0
-    DEG(1,181,2) = 1
-    DEG(1,181,3) = 0
-    DEG(1,181,4) = 0
-    DEG(1,181,5) = 1
-    DEG(1,181,6) = 0
-    DEG(1,181,7) = 0
-    DEG(1,181,8) = 1
-    DEG(1,181,9) = 0
-    DEG(1,181,10) = 0
-    DEG(1,181,11) = 1
-    DEG(1,181,12) = 0
-  COEF(1,181) = (-1.7572039597435545, 0)
-    DEG(1,182,1) = 0
-    DEG(1,182,2) = 1
-    DEG(1,182,3) = 0
-    DEG(1,182,4) = 0
-    DEG(1,182,5) = 0
-    DEG(1,182,6) = 1
-    DEG(1,182,7) = 0
-    DEG(1,182,8) = 1
-    DEG(1,182,9) = 0
-    DEG(1,182,10) = 0
-    DEG(1,182,11) = 1
-    DEG(1,182,12) = 0
-  COEF(1,182) = (3.195346014299941, 0)
-    DEG(1,183,1) = 0
-    DEG(1,183,2) = 0
-    DEG(1,183,3) = 0
-    DEG(1,183,4) = 0
-    DEG(1,183,5) = 0
-    DEG(1,183,6) = 0
-    DEG(1,183,7) = 0
-    DEG(1,183,8) = 0
-    DEG(1,183,9) = 1
-    DEG(1,183,10) = 0
-    DEG(1,183,11) = 1
-    DEG(1,183,12) = 0
-  COEF(1,183) = (0.6234913178994591, 0)
-    DEG(1,184,1) = 0
-    DEG(1,184,2) = 1
-    DEG(1,184,3) = 0
-    DEG(1,184,4) = 1
-    DEG(1,184,5) = 0
-    DEG(1,184,6) = 0
-    DEG(1,184,7) = 0
-    DEG(1,184,8) = 0
-    DEG(1,184,9) = 1
-    DEG(1,184,10) = 0
-    DEG(1,184,11) = 1
-    DEG(1,184,12) = 0
-  COEF(1,184) = (1.8891062637042868, 0)
-    DEG(1,185,1) = 0
-    DEG(1,185,2) = 1
-    DEG(1,185,3) = 0
-    DEG(1,185,4) = 0
-    DEG(1,185,5) = 1
-    DEG(1,185,6) = 0
-    DEG(1,185,7) = 0
-    DEG(1,185,8) = 0
-    DEG(1,185,9) = 1
-    DEG(1,185,10) = 0
-    DEG(1,185,11) = 1
-    DEG(1,185,12) = 0
-  COEF(1,185) = (-0.6234913178994591, 0)
-    DEG(1,186,1) = 0
-    DEG(1,186,2) = 1
-    DEG(1,186,3) = 0
-    DEG(1,186,4) = 0
-    DEG(1,186,5) = 0
-    DEG(1,186,6) = 1
-    DEG(1,186,7) = 0
-    DEG(1,186,8) = 0
-    DEG(1,186,9) = 1
-    DEG(1,186,10) = 0
-    DEG(1,186,11) = 1
-    DEG(1,186,12) = 0
-  COEF(1,186) = (0.6160772486418226, 0)
-    DEG(1,187,1) = 0
-    DEG(1,187,2) = 0
-    DEG(1,187,3) = 0
-    DEG(1,187,4) = 0
-    DEG(1,187,5) = 0
-    DEG(1,187,6) = 0
-    DEG(1,187,7) = 0
-    DEG(1,187,8) = 0
-    DEG(1,187,9) = 0
-    DEG(1,187,10) = 0
-    DEG(1,187,11) = 0
-    DEG(1,187,12) = 1
-  COEF(1,187) = (-1.6256212700376798, 0)
-    DEG(1,188,1) = 0
-    DEG(1,188,2) = 0
-    DEG(1,188,3) = 1
-    DEG(1,188,4) = 1
-    DEG(1,188,5) = 0
-    DEG(1,188,6) = 0
-    DEG(1,188,7) = 0
-    DEG(1,188,8) = 0
-    DEG(1,188,9) = 0
-    DEG(1,188,10) = 0
-    DEG(1,188,11) = 0
-    DEG(1,188,12) = 1
-  COEF(1,188) = (0.39959699282564654, 0)
-    DEG(1,189,1) = 0
-    DEG(1,189,2) = 0
-    DEG(1,189,3) = 1
-    DEG(1,189,4) = 0
-    DEG(1,189,5) = 1
-    DEG(1,189,6) = 0
-    DEG(1,189,7) = 0
-    DEG(1,189,8) = 0
-    DEG(1,189,9) = 0
-    DEG(1,189,10) = 0
-    DEG(1,189,11) = 0
-    DEG(1,189,12) = 1
-  COEF(1,189) = (-1.293763034961273, 0)
-    DEG(1,190,1) = 0
-    DEG(1,190,2) = 0
-    DEG(1,190,3) = 1
-    DEG(1,190,4) = 0
-    DEG(1,190,5) = 0
-    DEG(1,190,6) = 1
-    DEG(1,190,7) = 0
-    DEG(1,190,8) = 0
-    DEG(1,190,9) = 0
-    DEG(1,190,10) = 0
-    DEG(1,190,11) = 0
-    DEG(1,190,12) = 1
-  COEF(1,190) = (1.6256212700376798, 0)
-    DEG(1,191,1) = 0
-    DEG(1,191,2) = 0
-    DEG(1,191,3) = 0
-    DEG(1,191,4) = 0
-    DEG(1,191,5) = 0
-    DEG(1,191,6) = 0
-    DEG(1,191,7) = 1
-    DEG(1,191,8) = 0
-    DEG(1,191,9) = 0
-    DEG(1,191,10) = 0
-    DEG(1,191,11) = 0
-    DEG(1,191,12) = 1
-  COEF(1,191) = (-0.10377061920086407, 0)
-    DEG(1,192,1) = 0
-    DEG(1,192,2) = 0
-    DEG(1,192,3) = 1
-    DEG(1,192,4) = 1
-    DEG(1,192,5) = 0
-    DEG(1,192,6) = 0
-    DEG(1,192,7) = 1
-    DEG(1,192,8) = 0
-    DEG(1,192,9) = 0
-    DEG(1,192,10) = 0
-    DEG(1,192,11) = 0
-    DEG(1,192,12) = 1
-  COEF(1,192) = (3.132737846130069, 0)
-    DEG(1,193,1) = 0
-    DEG(1,193,2) = 0
-    DEG(1,193,3) = 1
-    DEG(1,193,4) = 0
-    DEG(1,193,5) = 1
-    DEG(1,193,6) = 0
-    DEG(1,193,7) = 1
-    DEG(1,193,8) = 0
-    DEG(1,193,9) = 0
-    DEG(1,193,10) = 0
-    DEG(1,193,11) = 0
-    DEG(1,193,12) = 1
-  COEF(1,193) = (-0.4997122303274737, 0)
-    DEG(1,194,1) = 0
-    DEG(1,194,2) = 0
-    DEG(1,194,3) = 1
-    DEG(1,194,4) = 0
-    DEG(1,194,5) = 0
-    DEG(1,194,6) = 1
-    DEG(1,194,7) = 1
-    DEG(1,194,8) = 0
-    DEG(1,194,9) = 0
-    DEG(1,194,10) = 0
-    DEG(1,194,11) = 0
-    DEG(1,194,12) = 1
-  COEF(1,194) = (0.10377061920086407, 0)
-    DEG(1,195,1) = 0
-    DEG(1,195,2) = 0
-    DEG(1,195,3) = 0
-    DEG(1,195,4) = 0
-    DEG(1,195,5) = 0
-    DEG(1,195,6) = 0
-    DEG(1,195,7) = 0
-    DEG(1,195,8) = 1
-    DEG(1,195,9) = 0
-    DEG(1,195,10) = 0
-    DEG(1,195,11) = 0
-    DEG(1,195,12) = 1
-  COEF(1,195) = (-3.195346014299941, 0)
-    DEG(1,196,1) = 0
-    DEG(1,196,2) = 0
-    DEG(1,196,3) = 1
-    DEG(1,196,4) = 1
-    DEG(1,196,5) = 0
-    DEG(1,196,6) = 0
-    DEG(1,196,7) = 0
-    DEG(1,196,8) = 1
-    DEG(1,196,9) = 0
-    DEG(1,196,10) = 0
-    DEG(1,196,11) = 0
-    DEG(1,196,12) = 1
-  COEF(1,196) = (-0.7315179354734475, 0)
-    DEG(1,197,1) = 0
-    DEG(1,197,2) = 0
-    DEG(1,197,3) = 1
-    DEG(1,197,4) = 0
-    DEG(1,197,5) = 1
-    DEG(1,197,6) = 0
-    DEG(1,197,7) = 0
-    DEG(1,197,8) = 1
-    DEG(1,197,9) = 0
-    DEG(1,197,10) = 0
-    DEG(1,197,11) = 0
-    DEG(1,197,12) = 1
-  COEF(1,197) = (-1.7572039597435545, 0)
-    DEG(1,198,1) = 0
-    DEG(1,198,2) = 0
-    DEG(1,198,3) = 1
-    DEG(1,198,4) = 0
-    DEG(1,198,5) = 0
-    DEG(1,198,6) = 1
-    DEG(1,198,7) = 0
-    DEG(1,198,8) = 1
-    DEG(1,198,9) = 0
-    DEG(1,198,10) = 0
-    DEG(1,198,11) = 0
-    DEG(1,198,12) = 1
-  COEF(1,198) = (3.195346014299941, 0)
-    DEG(1,199,1) = 0
-    DEG(1,199,2) = 0
-    DEG(1,199,3) = 0
-    DEG(1,199,4) = 0
-    DEG(1,199,5) = 0
-    DEG(1,199,6) = 0
-    DEG(1,199,7) = 0
-    DEG(1,199,8) = 0
-    DEG(1,199,9) = 1
-    DEG(1,199,10) = 0
-    DEG(1,199,11) = 0
-    DEG(1,199,12) = 1
-  COEF(1,199) = (-0.6160772486418226, 0)
-    DEG(1,200,1) = 0
-    DEG(1,200,2) = 0
-    DEG(1,200,3) = 1
-    DEG(1,200,4) = 1
-    DEG(1,200,5) = 0
-    DEG(1,200,6) = 0
-    DEG(1,200,7) = 0
-    DEG(1,200,8) = 0
-    DEG(1,200,9) = 1
-    DEG(1,200,10) = 0
-    DEG(1,200,11) = 0
-    DEG(1,200,12) = 1
-  COEF(1,200) = (1.8891062637042868, 0)
-    DEG(1,201,1) = 0
-    DEG(1,201,2) = 0
-    DEG(1,201,3) = 1
-    DEG(1,201,4) = 0
-    DEG(1,201,5) = 1
-    DEG(1,201,6) = 0
-    DEG(1,201,7) = 0
-    DEG(1,201,8) = 0
-    DEG(1,201,9) = 1
-    DEG(1,201,10) = 0
-    DEG(1,201,11) = 0
-    DEG(1,201,12) = 1
-  COEF(1,201) = (-0.6234913178994591, 0)
-    DEG(1,202,1) = 0
-    DEG(1,202,2) = 0
-    DEG(1,202,3) = 1
-    DEG(1,202,4) = 0
-    DEG(1,202,5) = 0
-    DEG(1,202,6) = 1
-    DEG(1,202,7) = 0
-    DEG(1,202,8) = 0
-    DEG(1,202,9) = 1
-    DEG(1,202,10) = 0
-    DEG(1,202,11) = 0
-    DEG(1,202,12) = 1
-  COEF(1,202) = (0.6160772486418226, 0)
-
-NUM_TERMS(2) = 202
-    DEG(2,1,1) = 0
-    DEG(2,1,2) = 0
-    DEG(2,1,3) = 0
-    DEG(2,1,4) = 0
-    DEG(2,1,5) = 0
-    DEG(2,1,6) = 0
-    DEG(2,1,7) = 0
-    DEG(2,1,8) = 0
-    DEG(2,1,9) = 0
-    DEG(2,1,10) = 0
-    DEG(2,1,11) = 0
-    DEG(2,1,12) = 0
-  COEF(2,1) = (0.16146145015739066, 0)
-    DEG(2,2,1) = 1
-    DEG(2,2,2) = 0
-    DEG(2,2,3) = 0
-    DEG(2,2,4) = 1
-    DEG(2,2,5) = 0
-    DEG(2,2,6) = 0
-    DEG(2,2,7) = 0
-    DEG(2,2,8) = 0
-    DEG(2,2,9) = 0
-    DEG(2,2,10) = 0
-    DEG(2,2,11) = 0
-    DEG(2,2,12) = 0
-  COEF(2,2) = (1.6227855047289532, 0)
-    DEG(2,3,1) = 0
-    DEG(2,3,2) = 1
-    DEG(2,3,3) = 0
-    DEG(2,3,4) = 1
-    DEG(2,3,5) = 0
-    DEG(2,3,6) = 0
-    DEG(2,3,7) = 0
-    DEG(2,3,8) = 0
-    DEG(2,3,9) = 0
-    DEG(2,3,10) = 0
-    DEG(2,3,11) = 0
-    DEG(2,3,12) = 0
-  COEF(2,3) = (-0.5383710123569654, 0)
-    DEG(2,4,1) = 0
-    DEG(2,4,2) = 0
-    DEG(2,4,3) = 1
-    DEG(2,4,4) = 1
-    DEG(2,4,5) = 0
-    DEG(2,4,6) = 0
-    DEG(2,4,7) = 0
-    DEG(2,4,8) = 0
-    DEG(2,4,9) = 0
-    DEG(2,4,10) = 0
-    DEG(2,4,11) = 0
-    DEG(2,4,12) = 0
-  COEF(2,4) = (-0.8991462350845966, 0)
-    DEG(2,5,1) = 0
-    DEG(2,5,2) = 0
-    DEG(2,5,3) = 0
-    DEG(2,5,4) = 2
-    DEG(2,5,5) = 0
-    DEG(2,5,6) = 0
-    DEG(2,5,7) = 0
-    DEG(2,5,8) = 0
-    DEG(2,5,9) = 0
-    DEG(2,5,10) = 0
-    DEG(2,5,11) = 0
-    DEG(2,5,12) = 0
-  COEF(2,5) = (-0.8113927523644766, 0)
-    DEG(2,6,1) = 1
-    DEG(2,6,2) = 0
-    DEG(2,6,3) = 0
-    DEG(2,6,4) = 0
-    DEG(2,6,5) = 1
-    DEG(2,6,6) = 0
-    DEG(2,6,7) = 0
-    DEG(2,6,8) = 0
-    DEG(2,6,9) = 0
-    DEG(2,6,10) = 0
-    DEG(2,6,11) = 0
-    DEG(2,6,12) = 0
-  COEF(2,6) = (-0.5383710123569654, 0)
-    DEG(2,7,1) = 0
-    DEG(2,7,2) = 1
-    DEG(2,7,3) = 0
-    DEG(2,7,4) = 0
-    DEG(2,7,5) = 1
-    DEG(2,7,6) = 0
-    DEG(2,7,7) = 0
-    DEG(2,7,8) = 0
-    DEG(2,7,9) = 0
-    DEG(2,7,10) = 0
-    DEG(2,7,11) = 0
-    DEG(2,7,12) = 0
-  COEF(2,7) = (-0.6051905230053307, 0)
-    DEG(2,8,1) = 0
-    DEG(2,8,2) = 0
-    DEG(2,8,3) = 1
-    DEG(2,8,4) = 0
-    DEG(2,8,5) = 1
-    DEG(2,8,6) = 0
-    DEG(2,8,7) = 0
-    DEG(2,8,8) = 0
-    DEG(2,8,9) = 0
-    DEG(2,8,10) = 0
-    DEG(2,8,11) = 0
-    DEG(2,8,12) = 0
-  COEF(2,8) = (-0.902193859128804, 0)
-    DEG(2,9,1) = 0
-    DEG(2,9,2) = 0
-    DEG(2,9,3) = 0
-    DEG(2,9,4) = 1
-    DEG(2,9,5) = 1
-    DEG(2,9,6) = 0
-    DEG(2,9,7) = 0
-    DEG(2,9,8) = 0
-    DEG(2,9,9) = 0
-    DEG(2,9,10) = 0
-    DEG(2,9,11) = 0
-    DEG(2,9,12) = 0
-  COEF(2,9) = (0.5383710123569654, 0)
-    DEG(2,10,1) = 0
-    DEG(2,10,2) = 0
-    DEG(2,10,3) = 0
-    DEG(2,10,4) = 0
-    DEG(2,10,5) = 2
-    DEG(2,10,6) = 0
-    DEG(2,10,7) = 0
-    DEG(2,10,8) = 0
-    DEG(2,10,9) = 0
-    DEG(2,10,10) = 0
-    DEG(2,10,11) = 0
-    DEG(2,10,12) = 0
-  COEF(2,10) = (0.30259526150266536, 0)
-    DEG(2,11,1) = 1
-    DEG(2,11,2) = 0
-    DEG(2,11,3) = 0
-    DEG(2,11,4) = 0
-    DEG(2,11,5) = 0
-    DEG(2,11,6) = 1
-    DEG(2,11,7) = 0
-    DEG(2,11,8) = 0
-    DEG(2,11,9) = 0
-    DEG(2,11,10) = 0
-    DEG(2,11,11) = 0
-    DEG(2,11,12) = 0
-  COEF(2,11) = (-0.8991462350845966, 0)
-    DEG(2,12,1) = 0
-    DEG(2,12,2) = 1
-    DEG(2,12,3) = 0
-    DEG(2,12,4) = 0
-    DEG(2,12,5) = 0
-    DEG(2,12,6) = 1
-    DEG(2,12,7) = 0
-    DEG(2,12,8) = 0
-    DEG(2,12,9) = 0
-    DEG(2,12,10) = 0
-    DEG(2,12,11) = 0
-    DEG(2,12,12) = 0
-  COEF(2,12) = (-0.902193859128804, 0)
-    DEG(2,13,1) = 0
-    DEG(2,13,2) = 0
-    DEG(2,13,3) = 1
-    DEG(2,13,4) = 0
-    DEG(2,13,5) = 0
-    DEG(2,13,6) = 1
-    DEG(2,13,7) = 0
-    DEG(2,13,8) = 0
-    DEG(2,13,9) = 0
-    DEG(2,13,10) = 0
-    DEG(2,13,11) = 0
-    DEG(2,13,12) = 0
-  COEF(2,13) = (-1.3405178820384038, 0)
-    DEG(2,14,1) = 0
-    DEG(2,14,2) = 0
-    DEG(2,14,3) = 0
-    DEG(2,14,4) = 1
-    DEG(2,14,5) = 0
-    DEG(2,14,6) = 1
-    DEG(2,14,7) = 0
-    DEG(2,14,8) = 0
-    DEG(2,14,9) = 0
-    DEG(2,14,10) = 0
-    DEG(2,14,11) = 0
-    DEG(2,14,12) = 0
-  COEF(2,14) = (0.8991462350845966, 0)
-    DEG(2,15,1) = 0
-    DEG(2,15,2) = 0
-    DEG(2,15,3) = 0
-    DEG(2,15,4) = 0
-    DEG(2,15,5) = 1
-    DEG(2,15,6) = 1
-    DEG(2,15,7) = 0
-    DEG(2,15,8) = 0
-    DEG(2,15,9) = 0
-    DEG(2,15,10) = 0
-    DEG(2,15,11) = 0
-    DEG(2,15,12) = 0
-  COEF(2,15) = (0.902193859128804, 0)
-    DEG(2,16,1) = 0
-    DEG(2,16,2) = 0
-    DEG(2,16,3) = 0
-    DEG(2,16,4) = 0
-    DEG(2,16,5) = 0
-    DEG(2,16,6) = 2
-    DEG(2,16,7) = 0
-    DEG(2,16,8) = 0
-    DEG(2,16,9) = 0
-    DEG(2,16,10) = 0
-    DEG(2,16,11) = 0
-    DEG(2,16,12) = 0
-  COEF(2,16) = (0.6702589410192019, 0)
-    DEG(2,17,1) = 0
-    DEG(2,17,2) = 0
-    DEG(2,17,3) = 0
-    DEG(2,17,4) = 0
-    DEG(2,17,5) = 0
-    DEG(2,17,6) = 0
-    DEG(2,17,7) = 1
-    DEG(2,17,8) = 0
-    DEG(2,17,9) = 0
-    DEG(2,17,10) = 0
-    DEG(2,17,11) = 0
-    DEG(2,17,12) = 0
-  COEF(2,17) = (-1.681707791938524, 0)
-    DEG(2,18,1) = 1
-    DEG(2,18,2) = 0
-    DEG(2,18,3) = 0
-    DEG(2,18,4) = 1
-    DEG(2,18,5) = 0
-    DEG(2,18,6) = 0
-    DEG(2,18,7) = 1
-    DEG(2,18,8) = 0
-    DEG(2,18,9) = 0
-    DEG(2,18,10) = 0
-    DEG(2,18,11) = 0
-    DEG(2,18,12) = 0
-  COEF(2,18) = (2.462154697268604, 0)
-    DEG(2,19,1) = 0
-    DEG(2,19,2) = 1
-    DEG(2,19,3) = 0
-    DEG(2,19,4) = 1
-    DEG(2,19,5) = 0
-    DEG(2,19,6) = 0
-    DEG(2,19,7) = 1
-    DEG(2,19,8) = 0
-    DEG(2,19,9) = 0
-    DEG(2,19,10) = 0
-    DEG(2,19,11) = 0
-    DEG(2,19,12) = 0
-  COEF(2,19) = (0.8277134832928559, 0)
-    DEG(2,20,1) = 0
-    DEG(2,20,2) = 0
-    DEG(2,20,3) = 1
-    DEG(2,20,4) = 1
-    DEG(2,20,5) = 0
-    DEG(2,20,6) = 0
-    DEG(2,20,7) = 1
-    DEG(2,20,8) = 0
-    DEG(2,20,9) = 0
-    DEG(2,20,10) = 0
-    DEG(2,20,11) = 0
-    DEG(2,20,12) = 0
-  COEF(2,20) = (-1.2912691084909407, 0)
-    DEG(2,21,1) = 0
-    DEG(2,21,2) = 0
-    DEG(2,21,3) = 0
-    DEG(2,21,4) = 2
-    DEG(2,21,5) = 0
-    DEG(2,21,6) = 0
-    DEG(2,21,7) = 1
-    DEG(2,21,8) = 0
-    DEG(2,21,9) = 0
-    DEG(2,21,10) = 0
-    DEG(2,21,11) = 0
-    DEG(2,21,12) = 0
-  COEF(2,21) = (-1.231077348634302, 0)
-    DEG(2,22,1) = 1
-    DEG(2,22,2) = 0
-    DEG(2,22,3) = 0
-    DEG(2,22,4) = 0
-    DEG(2,22,5) = 1
-    DEG(2,22,6) = 0
-    DEG(2,22,7) = 1
-    DEG(2,22,8) = 0
-    DEG(2,22,9) = 0
-    DEG(2,22,10) = 0
-    DEG(2,22,11) = 0
-    DEG(2,22,12) = 0
-  COEF(2,22) = (0.8277134832928559, 0)
-    DEG(2,23,1) = 0
-    DEG(2,23,2) = 1
-    DEG(2,23,3) = 0
-    DEG(2,23,4) = 0
-    DEG(2,23,5) = 1
-    DEG(2,23,6) = 0
-    DEG(2,23,7) = 1
-    DEG(2,23,8) = 0
-    DEG(2,23,9) = 0
-    DEG(2,23,10) = 0
-    DEG(2,23,11) = 0
-    DEG(2,23,12) = 0
-  COEF(2,23) = (1.6016505636912381, 0)
-    DEG(2,24,1) = 0
-    DEG(2,24,2) = 0
-    DEG(2,24,3) = 1
-    DEG(2,24,4) = 0
-    DEG(2,24,5) = 1
-    DEG(2,24,6) = 0
-    DEG(2,24,7) = 1
-    DEG(2,24,8) = 0
-    DEG(2,24,9) = 0
-    DEG(2,24,10) = 0
-    DEG(2,24,11) = 0
-    DEG(2,24,12) = 0
-  COEF(2,24) = (0.9228605754154384, 0)
-    DEG(2,25,1) = 0
-    DEG(2,25,2) = 0
-    DEG(2,25,3) = 0
-    DEG(2,25,4) = 1
-    DEG(2,25,5) = 1
-    DEG(2,25,6) = 0
-    DEG(2,25,7) = 1
-    DEG(2,25,8) = 0
-    DEG(2,25,9) = 0
-    DEG(2,25,10) = 0
-    DEG(2,25,11) = 0
-    DEG(2,25,12) = 0
-  COEF(2,25) = (-0.8277134832928559, 0)
-    DEG(2,26,1) = 0
-    DEG(2,26,2) = 0
-    DEG(2,26,3) = 0
-    DEG(2,26,4) = 0
-    DEG(2,26,5) = 2
-    DEG(2,26,6) = 0
-    DEG(2,26,7) = 1
-    DEG(2,26,8) = 0
-    DEG(2,26,9) = 0
-    DEG(2,26,10) = 0
-    DEG(2,26,11) = 0
-    DEG(2,26,12) = 0
-  COEF(2,26) = (-0.8008252818456191, 0)
-    DEG(2,27,1) = 1
-    DEG(2,27,2) = 0
-    DEG(2,27,3) = 0
-    DEG(2,27,4) = 0
-    DEG(2,27,5) = 0
-    DEG(2,27,6) = 1
-    DEG(2,27,7) = 1
-    DEG(2,27,8) = 0
-    DEG(2,27,9) = 0
-    DEG(2,27,10) = 0
-    DEG(2,27,11) = 0
-    DEG(2,27,12) = 0
-  COEF(2,27) = (-1.2912691084909407, 0)
-    DEG(2,28,1) = 0
-    DEG(2,28,2) = 1
-    DEG(2,28,3) = 0
-    DEG(2,28,4) = 0
-    DEG(2,28,5) = 0
-    DEG(2,28,6) = 1
-    DEG(2,28,7) = 1
-    DEG(2,28,8) = 0
-    DEG(2,28,9) = 0
-    DEG(2,28,10) = 0
-    DEG(2,28,11) = 0
-    DEG(2,28,12) = 0
-  COEF(2,28) = (0.9228605754154384, 0)
-    DEG(2,29,1) = 0
-    DEG(2,29,2) = 0
-    DEG(2,29,3) = 1
-    DEG(2,29,4) = 0
-    DEG(2,29,5) = 0
-    DEG(2,29,6) = 1
-    DEG(2,29,7) = 1
-    DEG(2,29,8) = 0
-    DEG(2,29,9) = 0
-    DEG(2,29,10) = 0
-    DEG(2,29,11) = 0
-    DEG(2,29,12) = 0
-  COEF(2,29) = (-0.7003896770827944, 0)
-    DEG(2,30,1) = 0
-    DEG(2,30,2) = 0
-    DEG(2,30,3) = 0
-    DEG(2,30,4) = 1
-    DEG(2,30,5) = 0
-    DEG(2,30,6) = 1
-    DEG(2,30,7) = 1
-    DEG(2,30,8) = 0
-    DEG(2,30,9) = 0
-    DEG(2,30,10) = 0
-    DEG(2,30,11) = 0
-    DEG(2,30,12) = 0
-  COEF(2,30) = (1.2912691084909407, 0)
-    DEG(2,31,1) = 0
-    DEG(2,31,2) = 0
-    DEG(2,31,3) = 0
-    DEG(2,31,4) = 0
-    DEG(2,31,5) = 1
-    DEG(2,31,6) = 1
-    DEG(2,31,7) = 1
-    DEG(2,31,8) = 0
-    DEG(2,31,9) = 0
-    DEG(2,31,10) = 0
-    DEG(2,31,11) = 0
-    DEG(2,31,12) = 0
-  COEF(2,31) = (-0.9228605754154384, 0)
-    DEG(2,32,1) = 0
-    DEG(2,32,2) = 0
-    DEG(2,32,3) = 0
-    DEG(2,32,4) = 0
-    DEG(2,32,5) = 0
-    DEG(2,32,6) = 2
-    DEG(2,32,7) = 1
-    DEG(2,32,8) = 0
-    DEG(2,32,9) = 0
-    DEG(2,32,10) = 0
-    DEG(2,32,11) = 0
-    DEG(2,32,12) = 0
-  COEF(2,32) = (0.3501948385413972, 0)
-    DEG(2,33,1) = 1
-    DEG(2,33,2) = 0
-    DEG(2,33,3) = 0
-    DEG(2,33,4) = 1
-    DEG(2,33,5) = 0
-    DEG(2,33,6) = 0
-    DEG(2,33,7) = 2
-    DEG(2,33,8) = 0
-    DEG(2,33,9) = 0
-    DEG(2,33,10) = 0
-    DEG(2,33,11) = 0
-    DEG(2,33,12) = 0
-  COEF(2,33) = (0.7855855523155274, 0)
-    DEG(2,34,1) = 0
-    DEG(2,34,2) = 1
-    DEG(2,34,3) = 0
-    DEG(2,34,4) = 1
-    DEG(2,34,5) = 0
-    DEG(2,34,6) = 0
-    DEG(2,34,7) = 2
-    DEG(2,34,8) = 0
-    DEG(2,34,9) = 0
-    DEG(2,34,10) = 0
-    DEG(2,34,11) = 0
-    DEG(2,34,12) = 0
-  COEF(2,34) = (1.7724222716321576, 0)
-    DEG(2,35,1) = 0
-    DEG(2,35,2) = 0
-    DEG(2,35,3) = 1
-    DEG(2,35,4) = 1
-    DEG(2,35,5) = 0
-    DEG(2,35,6) = 0
-    DEG(2,35,7) = 2
-    DEG(2,35,8) = 0
-    DEG(2,35,9) = 0
-    DEG(2,35,10) = 0
-    DEG(2,35,11) = 0
-    DEG(2,35,12) = 0
-  COEF(2,35) = (-0.1790746293138776, 0)
-    DEG(2,36,1) = 0
-    DEG(2,36,2) = 0
-    DEG(2,36,3) = 0
-    DEG(2,36,4) = 2
-    DEG(2,36,5) = 0
-    DEG(2,36,6) = 0
-    DEG(2,36,7) = 2
-    DEG(2,36,8) = 0
-    DEG(2,36,9) = 0
-    DEG(2,36,10) = 0
-    DEG(2,36,11) = 0
-    DEG(2,36,12) = 0
-  COEF(2,36) = (-0.3927927761577637, 0)
-    DEG(2,37,1) = 1
-    DEG(2,37,2) = 0
-    DEG(2,37,3) = 0
-    DEG(2,37,4) = 0
-    DEG(2,37,5) = 1
-    DEG(2,37,6) = 0
-    DEG(2,37,7) = 2
-    DEG(2,37,8) = 0
-    DEG(2,37,9) = 0
-    DEG(2,37,10) = 0
-    DEG(2,37,11) = 0
-    DEG(2,37,12) = 0
-  COEF(2,37) = (1.7724222716321576, 0)
-    DEG(2,38,1) = 0
-    DEG(2,38,2) = 1
-    DEG(2,38,3) = 0
-    DEG(2,38,4) = 0
-    DEG(2,38,5) = 1
-    DEG(2,38,6) = 0
-    DEG(2,38,7) = 2
-    DEG(2,38,8) = 0
-    DEG(2,38,9) = 0
-    DEG(2,38,10) = 0
-    DEG(2,38,11) = 0
-    DEG(2,38,12) = 0
-  COEF(2,38) = (-0.7039393422229877, 0)
-    DEG(2,39,1) = 0
-    DEG(2,39,2) = 0
-    DEG(2,39,3) = 1
-    DEG(2,39,4) = 0
-    DEG(2,39,5) = 1
-    DEG(2,39,6) = 0
-    DEG(2,39,7) = 2
-    DEG(2,39,8) = 0
-    DEG(2,39,9) = 0
-    DEG(2,39,10) = 0
-    DEG(2,39,11) = 0
-    DEG(2,39,12) = 0
-  COEF(2,39) = (0.35488257337908125, 0)
-    DEG(2,40,1) = 0
-    DEG(2,40,2) = 0
-    DEG(2,40,3) = 0
-    DEG(2,40,4) = 1
-    DEG(2,40,5) = 1
-    DEG(2,40,6) = 0
-    DEG(2,40,7) = 2
-    DEG(2,40,8) = 0
-    DEG(2,40,9) = 0
-    DEG(2,40,10) = 0
-    DEG(2,40,11) = 0
-    DEG(2,40,12) = 0
-  COEF(2,40) = (-1.7724222716321576, 0)
-    DEG(2,41,1) = 0
-    DEG(2,41,2) = 0
-    DEG(2,41,3) = 0
-    DEG(2,41,4) = 0
-    DEG(2,41,5) = 2
-    DEG(2,41,6) = 0
-    DEG(2,41,7) = 2
-    DEG(2,41,8) = 0
-    DEG(2,41,9) = 0
-    DEG(2,41,10) = 0
-    DEG(2,41,11) = 0
-    DEG(2,41,12) = 0
-  COEF(2,41) = (0.35196967111149385, 0)
-    DEG(2,42,1) = 1
-    DEG(2,42,2) = 0
-    DEG(2,42,3) = 0
-    DEG(2,42,4) = 0
-    DEG(2,42,5) = 0
-    DEG(2,42,6) = 1
-    DEG(2,42,7) = 2
-    DEG(2,42,8) = 0
-    DEG(2,42,9) = 0
-    DEG(2,42,10) = 0
-    DEG(2,42,11) = 0
-    DEG(2,42,12) = 0
-  COEF(2,42) = (-0.1790746293138776, 0)
-    DEG(2,43,1) = 0
-    DEG(2,43,2) = 1
-    DEG(2,43,3) = 0
-    DEG(2,43,4) = 0
-    DEG(2,43,5) = 0
-    DEG(2,43,6) = 1
-    DEG(2,43,7) = 2
-    DEG(2,43,8) = 0
-    DEG(2,43,9) = 0
-    DEG(2,43,10) = 0
-    DEG(2,43,11) = 0
-    DEG(2,43,12) = 0
-  COEF(2,43) = (0.35488257337908125, 0)
-    DEG(2,44,1) = 0
-    DEG(2,44,2) = 0
-    DEG(2,44,3) = 1
-    DEG(2,44,4) = 0
-    DEG(2,44,5) = 0
-    DEG(2,44,6) = 1
-    DEG(2,44,7) = 2
-    DEG(2,44,8) = 0
-    DEG(2,44,9) = 0
-    DEG(2,44,10) = 0
-    DEG(2,44,11) = 0
-    DEG(2,44,12) = 0
-  COEF(2,44) = (-0.08164621009253965, 0)
-    DEG(2,45,1) = 0
-    DEG(2,45,2) = 0
-    DEG(2,45,3) = 0
-    DEG(2,45,4) = 1
-    DEG(2,45,5) = 0
-    DEG(2,45,6) = 1
-    DEG(2,45,7) = 2
-    DEG(2,45,8) = 0
-    DEG(2,45,9) = 0
-    DEG(2,45,10) = 0
-    DEG(2,45,11) = 0
-    DEG(2,45,12) = 0
-  COEF(2,45) = (0.1790746293138776, 0)
-    DEG(2,46,1) = 0
-    DEG(2,46,2) = 0
-    DEG(2,46,3) = 0
-    DEG(2,46,4) = 0
-    DEG(2,46,5) = 1
-    DEG(2,46,6) = 1
-    DEG(2,46,7) = 2
-    DEG(2,46,8) = 0
-    DEG(2,46,9) = 0
-    DEG(2,46,10) = 0
-    DEG(2,46,11) = 0
-    DEG(2,46,12) = 0
-  COEF(2,46) = (-0.35488257337908125, 0)
-    DEG(2,47,1) = 0
-    DEG(2,47,2) = 0
-    DEG(2,47,3) = 0
-    DEG(2,47,4) = 0
-    DEG(2,47,5) = 0
-    DEG(2,47,6) = 2
-    DEG(2,47,7) = 2
-    DEG(2,47,8) = 0
-    DEG(2,47,9) = 0
-    DEG(2,47,10) = 0
-    DEG(2,47,11) = 0
-    DEG(2,47,12) = 0
-  COEF(2,47) = (0.04082310504626983, 0)
-    DEG(2,48,1) = 0
-    DEG(2,48,2) = 0
-    DEG(2,48,3) = 0
-    DEG(2,48,4) = 0
-    DEG(2,48,5) = 0
-    DEG(2,48,6) = 0
-    DEG(2,48,7) = 0
-    DEG(2,48,8) = 1
-    DEG(2,48,9) = 0
-    DEG(2,48,10) = 0
-    DEG(2,48,11) = 0
-    DEG(2,48,12) = 0
-  COEF(2,48) = (-0.3651078728365349, 0)
-    DEG(2,49,1) = 1
-    DEG(2,49,2) = 0
-    DEG(2,49,3) = 0
-    DEG(2,49,4) = 1
-    DEG(2,49,5) = 0
-    DEG(2,49,6) = 0
-    DEG(2,49,7) = 0
-    DEG(2,49,8) = 1
-    DEG(2,49,9) = 0
-    DEG(2,49,10) = 0
-    DEG(2,49,11) = 0
-    DEG(2,49,12) = 0
-  COEF(2,49) = (1.8533256573361678, 0)
-    DEG(2,50,1) = 0
-    DEG(2,50,2) = 1
-    DEG(2,50,3) = 0
-    DEG(2,50,4) = 1
-    DEG(2,50,5) = 0
-    DEG(2,50,6) = 0
-    DEG(2,50,7) = 0
-    DEG(2,50,8) = 1
-    DEG(2,50,9) = 0
-    DEG(2,50,10) = 0
-    DEG(2,50,11) = 0
-    DEG(2,50,12) = 0
-  COEF(2,50) = (0.38504589404082495, 0)
-    DEG(2,51,1) = 0
-    DEG(2,51,2) = 0
-    DEG(2,51,3) = 1
-    DEG(2,51,4) = 1
-    DEG(2,51,5) = 0
-    DEG(2,51,6) = 0
-    DEG(2,51,7) = 0
-    DEG(2,51,8) = 1
-    DEG(2,51,9) = 0
-    DEG(2,51,10) = 0
-    DEG(2,51,11) = 0
-    DEG(2,51,12) = 0
-  COEF(2,51) = (2.514773408182168, 0)
-    DEG(2,52,1) = 0
-    DEG(2,52,2) = 0
-    DEG(2,52,3) = 0
-    DEG(2,52,4) = 2
-    DEG(2,52,5) = 0
-    DEG(2,52,6) = 0
-    DEG(2,52,7) = 0
-    DEG(2,52,8) = 1
-    DEG(2,52,9) = 0
-    DEG(2,52,10) = 0
-    DEG(2,52,11) = 0
-    DEG(2,52,12) = 0
-  COEF(2,52) = (-0.9266628286680839, 0)
-    DEG(2,53,1) = 1
-    DEG(2,53,2) = 0
-    DEG(2,53,3) = 0
-    DEG(2,53,4) = 0
-    DEG(2,53,5) = 1
-    DEG(2,53,6) = 0
-    DEG(2,53,7) = 0
-    DEG(2,53,8) = 1
-    DEG(2,53,9) = 0
-    DEG(2,53,10) = 0
-    DEG(2,53,11) = 0
-    DEG(2,53,12) = 0
-  COEF(2,53) = (0.38504589404082495, 0)
-    DEG(2,54,1) = 0
-    DEG(2,54,2) = 1
-    DEG(2,54,3) = 0
-    DEG(2,54,4) = 0
-    DEG(2,54,5) = 1
-    DEG(2,54,6) = 0
-    DEG(2,54,7) = 0
-    DEG(2,54,8) = 1
-    DEG(2,54,9) = 0
-    DEG(2,54,10) = 0
-    DEG(2,54,11) = 0
-    DEG(2,54,12) = 0
-  COEF(2,54) = (1.0307187004000027, 0)
-    DEG(2,55,1) = 0
-    DEG(2,55,2) = 0
-    DEG(2,55,3) = 1
-    DEG(2,55,4) = 0
-    DEG(2,55,5) = 1
-    DEG(2,55,6) = 0
-    DEG(2,55,7) = 0
-    DEG(2,55,8) = 1
-    DEG(2,55,9) = 0
-    DEG(2,55,10) = 0
-    DEG(2,55,11) = 0
-    DEG(2,55,12) = 0
-  COEF(2,55) = (0.145249416724295, 0)
-    DEG(2,56,1) = 0
-    DEG(2,56,2) = 0
-    DEG(2,56,3) = 0
-    DEG(2,56,4) = 1
-    DEG(2,56,5) = 1
-    DEG(2,56,6) = 0
-    DEG(2,56,7) = 0
-    DEG(2,56,8) = 1
-    DEG(2,56,9) = 0
-    DEG(2,56,10) = 0
-    DEG(2,56,11) = 0
-    DEG(2,56,12) = 0
-  COEF(2,56) = (-0.38504589404082495, 0)
-    DEG(2,57,1) = 0
-    DEG(2,57,2) = 0
-    DEG(2,57,3) = 0
-    DEG(2,57,4) = 0
-    DEG(2,57,5) = 2
-    DEG(2,57,6) = 0
-    DEG(2,57,7) = 0
-    DEG(2,57,8) = 1
-    DEG(2,57,9) = 0
-    DEG(2,57,10) = 0
-    DEG(2,57,11) = 0
-    DEG(2,57,12) = 0
-  COEF(2,57) = (-0.5153593502000013, 0)
-    DEG(2,58,1) = 1
-    DEG(2,58,2) = 0
-    DEG(2,58,3) = 0
-    DEG(2,58,4) = 0
-    DEG(2,58,5) = 0
-    DEG(2,58,6) = 1
-    DEG(2,58,7) = 0
-    DEG(2,58,8) = 1
-    DEG(2,58,9) = 0
-    DEG(2,58,10) = 0
-    DEG(2,58,11) = 0
-    DEG(2,58,12) = 0
-  COEF(2,58) = (2.514773408182168, 0)
-    DEG(2,59,1) = 0
-    DEG(2,59,2) = 1
-    DEG(2,59,3) = 0
-    DEG(2,59,4) = 0
-    DEG(2,59,5) = 0
-    DEG(2,59,6) = 1
-    DEG(2,59,7) = 0
-    DEG(2,59,8) = 1
-    DEG(2,59,9) = 0
-    DEG(2,59,10) = 0
-    DEG(2,59,11) = 0
-    DEG(2,59,12) = 0
-  COEF(2,59) = (0.145249416724295, 0)
-    DEG(2,60,1) = 0
-    DEG(2,60,2) = 0
-    DEG(2,60,3) = 1
-    DEG(2,60,4) = 0
-    DEG(2,60,5) = 0
-    DEG(2,60,6) = 1
-    DEG(2,60,7) = 0
-    DEG(2,60,8) = 1
-    DEG(2,60,9) = 0
-    DEG(2,60,10) = 0
-    DEG(2,60,11) = 0
-    DEG(2,60,12) = 0
-  COEF(2,60) = (-2.153828612063101, 0)
-    DEG(2,61,1) = 0
-    DEG(2,61,2) = 0
-    DEG(2,61,3) = 0
-    DEG(2,61,4) = 1
-    DEG(2,61,5) = 0
-    DEG(2,61,6) = 1
-    DEG(2,61,7) = 0
-    DEG(2,61,8) = 1
-    DEG(2,61,9) = 0
-    DEG(2,61,10) = 0
-    DEG(2,61,11) = 0
-    DEG(2,61,12) = 0
-  COEF(2,61) = (-2.514773408182168, 0)
-    DEG(2,62,1) = 0
-    DEG(2,62,2) = 0
-    DEG(2,62,3) = 0
-    DEG(2,62,4) = 0
-    DEG(2,62,5) = 1
-    DEG(2,62,6) = 1
-    DEG(2,62,7) = 0
-    DEG(2,62,8) = 1
-    DEG(2,62,9) = 0
-    DEG(2,62,10) = 0
-    DEG(2,62,11) = 0
-    DEG(2,62,12) = 0
-  COEF(2,62) = (-0.145249416724295, 0)
-    DEG(2,63,1) = 0
-    DEG(2,63,2) = 0
-    DEG(2,63,3) = 0
-    DEG(2,63,4) = 0
-    DEG(2,63,5) = 0
-    DEG(2,63,6) = 2
-    DEG(2,63,7) = 0
-    DEG(2,63,8) = 1
-    DEG(2,63,9) = 0
-    DEG(2,63,10) = 0
-    DEG(2,63,11) = 0
-    DEG(2,63,12) = 0
-  COEF(2,63) = (1.0769143060315505, 0)
-    DEG(2,64,1) = 1
-    DEG(2,64,2) = 0
-    DEG(2,64,3) = 0
-    DEG(2,64,4) = 1
-    DEG(2,64,5) = 0
-    DEG(2,64,6) = 0
-    DEG(2,64,7) = 1
-    DEG(2,64,8) = 1
-    DEG(2,64,9) = 0
-    DEG(2,64,10) = 0
-    DEG(2,64,11) = 0
-    DEG(2,64,12) = 0
-  COEF(2,64) = (2.3549864169514416, 0)
-    DEG(2,65,1) = 0
-    DEG(2,65,2) = 1
-    DEG(2,65,3) = 0
-    DEG(2,65,4) = 1
-    DEG(2,65,5) = 0
-    DEG(2,65,6) = 0
-    DEG(2,65,7) = 1
-    DEG(2,65,8) = 1
-    DEG(2,65,9) = 0
-    DEG(2,65,10) = 0
-    DEG(2,65,11) = 0
-    DEG(2,65,12) = 0
-  COEF(2,65) = (-1.077411549901898, 0)
-    DEG(2,66,1) = 0
-    DEG(2,66,2) = 0
-    DEG(2,66,3) = 1
-    DEG(2,66,4) = 1
-    DEG(2,66,5) = 0
-    DEG(2,66,6) = 0
-    DEG(2,66,7) = 1
-    DEG(2,66,8) = 1
-    DEG(2,66,9) = 0
-    DEG(2,66,10) = 0
-    DEG(2,66,11) = 0
-    DEG(2,66,12) = 0
-  COEF(2,66) = (1.2499706689461316, 0)
-    DEG(2,67,1) = 0
-    DEG(2,67,2) = 0
-    DEG(2,67,3) = 0
-    DEG(2,67,4) = 2
-    DEG(2,67,5) = 0
-    DEG(2,67,6) = 0
-    DEG(2,67,7) = 1
-    DEG(2,67,8) = 1
-    DEG(2,67,9) = 0
-    DEG(2,67,10) = 0
-    DEG(2,67,11) = 0
-    DEG(2,67,12) = 0
-  COEF(2,67) = (-1.1774932084757208, 0)
-    DEG(2,68,1) = 1
-    DEG(2,68,2) = 0
-    DEG(2,68,3) = 0
-    DEG(2,68,4) = 0
-    DEG(2,68,5) = 1
-    DEG(2,68,6) = 0
-    DEG(2,68,7) = 1
-    DEG(2,68,8) = 1
-    DEG(2,68,9) = 0
-    DEG(2,68,10) = 0
-    DEG(2,68,11) = 0
-    DEG(2,68,12) = 0
-  COEF(2,68) = (-1.077411549901898, 0)
-    DEG(2,69,1) = 0
-    DEG(2,69,2) = 1
-    DEG(2,69,3) = 0
-    DEG(2,69,4) = 0
-    DEG(2,69,5) = 1
-    DEG(2,69,6) = 0
-    DEG(2,69,7) = 1
-    DEG(2,69,8) = 1
-    DEG(2,69,9) = 0
-    DEG(2,69,10) = 0
-    DEG(2,69,11) = 0
-    DEG(2,69,12) = 0
-  COEF(2,69) = (-2.068879019637729, 0)
-    DEG(2,70,1) = 0
-    DEG(2,70,2) = 0
-    DEG(2,70,3) = 1
-    DEG(2,70,4) = 0
-    DEG(2,70,5) = 1
-    DEG(2,70,6) = 0
-    DEG(2,70,7) = 1
-    DEG(2,70,8) = 1
-    DEG(2,70,9) = 0
-    DEG(2,70,10) = 0
-    DEG(2,70,11) = 0
-    DEG(2,70,12) = 0
-  COEF(2,70) = (1.825992763872477, 0)
-    DEG(2,71,1) = 0
-    DEG(2,71,2) = 0
-    DEG(2,71,3) = 0
-    DEG(2,71,4) = 1
-    DEG(2,71,5) = 1
-    DEG(2,71,6) = 0
-    DEG(2,71,7) = 1
-    DEG(2,71,8) = 1
-    DEG(2,71,9) = 0
-    DEG(2,71,10) = 0
-    DEG(2,71,11) = 0
-    DEG(2,71,12) = 0
-  COEF(2,71) = (1.077411549901898, 0)
-    DEG(2,72,1) = 0
-    DEG(2,72,2) = 0
-    DEG(2,72,3) = 0
-    DEG(2,72,4) = 0
-    DEG(2,72,5) = 2
-    DEG(2,72,6) = 0
-    DEG(2,72,7) = 1
-    DEG(2,72,8) = 1
-    DEG(2,72,9) = 0
-    DEG(2,72,10) = 0
-    DEG(2,72,11) = 0
-    DEG(2,72,12) = 0
-  COEF(2,72) = (1.0344395098188646, 0)
-    DEG(2,73,1) = 1
-    DEG(2,73,2) = 0
-    DEG(2,73,3) = 0
-    DEG(2,73,4) = 0
-    DEG(2,73,5) = 0
-    DEG(2,73,6) = 1
-    DEG(2,73,7) = 1
-    DEG(2,73,8) = 1
-    DEG(2,73,9) = 0
-    DEG(2,73,10) = 0
-    DEG(2,73,11) = 0
-    DEG(2,73,12) = 0
-  COEF(2,73) = (1.2499706689461316, 0)
-    DEG(2,74,1) = 0
-    DEG(2,74,2) = 1
-    DEG(2,74,3) = 0
-    DEG(2,74,4) = 0
-    DEG(2,74,5) = 0
-    DEG(2,74,6) = 1
-    DEG(2,74,7) = 1
-    DEG(2,74,8) = 1
-    DEG(2,74,9) = 0
-    DEG(2,74,10) = 0
-    DEG(2,74,11) = 0
-    DEG(2,74,12) = 0
-  COEF(2,74) = (1.825992763872477, 0)
-    DEG(2,75,1) = 0
-    DEG(2,75,2) = 0
-    DEG(2,75,3) = 1
-    DEG(2,75,4) = 0
-    DEG(2,75,5) = 0
-    DEG(2,75,6) = 1
-    DEG(2,75,7) = 1
-    DEG(2,75,8) = 1
-    DEG(2,75,9) = 0
-    DEG(2,75,10) = 0
-    DEG(2,75,11) = 0
-    DEG(2,75,12) = 0
-  COEF(2,75) = (-0.2861073973137122, 0)
-    DEG(2,76,1) = 0
-    DEG(2,76,2) = 0
-    DEG(2,76,3) = 0
-    DEG(2,76,4) = 1
-    DEG(2,76,5) = 0
-    DEG(2,76,6) = 1
-    DEG(2,76,7) = 1
-    DEG(2,76,8) = 1
-    DEG(2,76,9) = 0
-    DEG(2,76,10) = 0
-    DEG(2,76,11) = 0
-    DEG(2,76,12) = 0
-  COEF(2,76) = (-1.2499706689461316, 0)
-    DEG(2,77,1) = 0
-    DEG(2,77,2) = 0
-    DEG(2,77,3) = 0
-    DEG(2,77,4) = 0
-    DEG(2,77,5) = 1
-    DEG(2,77,6) = 1
-    DEG(2,77,7) = 1
-    DEG(2,77,8) = 1
-    DEG(2,77,9) = 0
-    DEG(2,77,10) = 0
-    DEG(2,77,11) = 0
-    DEG(2,77,12) = 0
-  COEF(2,77) = (-1.825992763872477, 0)
-    DEG(2,78,1) = 0
-    DEG(2,78,2) = 0
-    DEG(2,78,3) = 0
-    DEG(2,78,4) = 0
-    DEG(2,78,5) = 0
-    DEG(2,78,6) = 2
-    DEG(2,78,7) = 1
-    DEG(2,78,8) = 1
-    DEG(2,78,9) = 0
-    DEG(2,78,10) = 0
-    DEG(2,78,11) = 0
-    DEG(2,78,12) = 0
-  COEF(2,78) = (0.1430536986568561, 0)
-    DEG(2,79,1) = 1
-    DEG(2,79,2) = 0
-    DEG(2,79,3) = 0
-    DEG(2,79,4) = 1
-    DEG(2,79,5) = 0
-    DEG(2,79,6) = 0
-    DEG(2,79,7) = 0
-    DEG(2,79,8) = 2
-    DEG(2,79,9) = 0
-    DEG(2,79,10) = 0
-    DEG(2,79,11) = 0
-    DEG(2,79,12) = 0
-  COEF(2,79) = (-0.9887571326279446, 0)
-    DEG(2,80,1) = 0
-    DEG(2,80,2) = 1
-    DEG(2,80,3) = 0
-    DEG(2,80,4) = 1
-    DEG(2,80,5) = 0
-    DEG(2,80,6) = 0
-    DEG(2,80,7) = 0
-    DEG(2,80,8) = 2
-    DEG(2,80,9) = 0
-    DEG(2,80,10) = 0
-    DEG(2,80,11) = 0
-    DEG(2,80,12) = 0
-  COEF(2,80) = (-0.760737120671438, 0)
-    DEG(2,81,1) = 0
-    DEG(2,81,2) = 0
-    DEG(2,81,3) = 1
-    DEG(2,81,4) = 1
-    DEG(2,81,5) = 0
-    DEG(2,81,6) = 0
-    DEG(2,81,7) = 0
-    DEG(2,81,8) = 2
-    DEG(2,81,9) = 0
-    DEG(2,81,10) = 0
-    DEG(2,81,11) = 0
-    DEG(2,81,12) = 0
-  COEF(2,81) = (1.070251227923252, 0)
-    DEG(2,82,1) = 0
-    DEG(2,82,2) = 0
-    DEG(2,82,3) = 0
-    DEG(2,82,4) = 2
-    DEG(2,82,5) = 0
-    DEG(2,82,6) = 0
-    DEG(2,82,7) = 0
-    DEG(2,82,8) = 2
-    DEG(2,82,9) = 0
-    DEG(2,82,10) = 0
-    DEG(2,82,11) = 0
-    DEG(2,82,12) = 0
-  COEF(2,82) = (0.4943785663139723, 0)
-    DEG(2,83,1) = 1
-    DEG(2,83,2) = 0
-    DEG(2,83,3) = 0
-    DEG(2,83,4) = 0
-    DEG(2,83,5) = 1
-    DEG(2,83,6) = 0
-    DEG(2,83,7) = 0
-    DEG(2,83,8) = 2
-    DEG(2,83,9) = 0
-    DEG(2,83,10) = 0
-    DEG(2,83,11) = 0
-    DEG(2,83,12) = 0
-  COEF(2,83) = (-0.760737120671438, 0)
-    DEG(2,84,1) = 0
-    DEG(2,84,2) = 1
-    DEG(2,84,3) = 0
-    DEG(2,84,4) = 0
-    DEG(2,84,5) = 1
-    DEG(2,84,6) = 0
-    DEG(2,84,7) = 0
-    DEG(2,84,8) = 2
-    DEG(2,84,9) = 0
-    DEG(2,84,10) = 0
-    DEG(2,84,11) = 0
-    DEG(2,84,12) = 0
-  COEF(2,84) = (-0.08962519309192024, 0)
-    DEG(2,85,1) = 0
-    DEG(2,85,2) = 0
-    DEG(2,85,3) = 1
-    DEG(2,85,4) = 0
-    DEG(2,85,5) = 1
-    DEG(2,85,6) = 0
-    DEG(2,85,7) = 0
-    DEG(2,85,8) = 2
-    DEG(2,85,9) = 0
-    DEG(2,85,10) = 0
-    DEG(2,85,11) = 0
-    DEG(2,85,12) = 0
-  COEF(2,85) = (-0.22953465440404058, 0)
-    DEG(2,86,1) = 0
-    DEG(2,86,2) = 0
-    DEG(2,86,3) = 0
-    DEG(2,86,4) = 1
-    DEG(2,86,5) = 1
-    DEG(2,86,6) = 0
-    DEG(2,86,7) = 0
-    DEG(2,86,8) = 2
-    DEG(2,86,9) = 0
-    DEG(2,86,10) = 0
-    DEG(2,86,11) = 0
-    DEG(2,86,12) = 0
-  COEF(2,86) = (0.760737120671438, 0)
-    DEG(2,87,1) = 0
-    DEG(2,87,2) = 0
-    DEG(2,87,3) = 0
-    DEG(2,87,4) = 0
-    DEG(2,87,5) = 2
-    DEG(2,87,6) = 0
-    DEG(2,87,7) = 0
-    DEG(2,87,8) = 2
-    DEG(2,87,9) = 0
-    DEG(2,87,10) = 0
-    DEG(2,87,11) = 0
-    DEG(2,87,12) = 0
-  COEF(2,87) = (0.04481259654596012, 0)
-    DEG(2,88,1) = 1
-    DEG(2,88,2) = 0
-    DEG(2,88,3) = 0
-    DEG(2,88,4) = 0
-    DEG(2,88,5) = 0
-    DEG(2,88,6) = 1
-    DEG(2,88,7) = 0
-    DEG(2,88,8) = 2
-    DEG(2,88,9) = 0
-    DEG(2,88,10) = 0
-    DEG(2,88,11) = 0
-    DEG(2,88,12) = 0
-  COEF(2,88) = (1.070251227923252, 0)
-    DEG(2,89,1) = 0
-    DEG(2,89,2) = 1
-    DEG(2,89,3) = 0
-    DEG(2,89,4) = 0
-    DEG(2,89,5) = 0
-    DEG(2,89,6) = 1
-    DEG(2,89,7) = 0
-    DEG(2,89,8) = 2
-    DEG(2,89,9) = 0
-    DEG(2,89,10) = 0
-    DEG(2,89,11) = 0
-    DEG(2,89,12) = 0
-  COEF(2,89) = (-0.22953465440404058, 0)
-    DEG(2,90,1) = 0
-    DEG(2,90,2) = 0
-    DEG(2,90,3) = 1
-    DEG(2,90,4) = 0
-    DEG(2,90,5) = 0
-    DEG(2,90,6) = 1
-    DEG(2,90,7) = 0
-    DEG(2,90,8) = 2
-    DEG(2,90,9) = 0
-    DEG(2,90,10) = 0
-    DEG(2,90,11) = 0
-    DEG(2,90,12) = 0
-  COEF(2,90) = (1.0783823257198648, 0)
-    DEG(2,91,1) = 0
-    DEG(2,91,2) = 0
-    DEG(2,91,3) = 0
-    DEG(2,91,4) = 1
-    DEG(2,91,5) = 0
-    DEG(2,91,6) = 1
-    DEG(2,91,7) = 0
-    DEG(2,91,8) = 2
-    DEG(2,91,9) = 0
-    DEG(2,91,10) = 0
-    DEG(2,91,11) = 0
-    DEG(2,91,12) = 0
-  COEF(2,91) = (-1.070251227923252, 0)
-    DEG(2,92,1) = 0
-    DEG(2,92,2) = 0
-    DEG(2,92,3) = 0
-    DEG(2,92,4) = 0
-    DEG(2,92,5) = 1
-    DEG(2,92,6) = 1
-    DEG(2,92,7) = 0
-    DEG(2,92,8) = 2
-    DEG(2,92,9) = 0
-    DEG(2,92,10) = 0
-    DEG(2,92,11) = 0
-    DEG(2,92,12) = 0
-  COEF(2,92) = (0.22953465440404058, 0)
-    DEG(2,93,1) = 0
-    DEG(2,93,2) = 0
-    DEG(2,93,3) = 0
-    DEG(2,93,4) = 0
-    DEG(2,93,5) = 0
-    DEG(2,93,6) = 2
-    DEG(2,93,7) = 0
-    DEG(2,93,8) = 2
-    DEG(2,93,9) = 0
-    DEG(2,93,10) = 0
-    DEG(2,93,11) = 0
-    DEG(2,93,12) = 0
-  COEF(2,93) = (-0.5391911628599324, 0)
-    DEG(2,94,1) = 0
-    DEG(2,94,2) = 0
-    DEG(2,94,3) = 0
-    DEG(2,94,4) = 0
-    DEG(2,94,5) = 0
-    DEG(2,94,6) = 0
-    DEG(2,94,7) = 0
-    DEG(2,94,8) = 0
-    DEG(2,94,9) = 1
-    DEG(2,94,10) = 0
-    DEG(2,94,11) = 0
-    DEG(2,94,12) = 0
-  COEF(2,94) = (-3.186254412558727, 0)
-    DEG(2,95,1) = 1
-    DEG(2,95,2) = 0
-    DEG(2,95,3) = 0
-    DEG(2,95,4) = 1
-    DEG(2,95,5) = 0
-    DEG(2,95,6) = 0
-    DEG(2,95,7) = 0
-    DEG(2,95,8) = 0
-    DEG(2,95,9) = 1
-    DEG(2,95,10) = 0
-    DEG(2,95,11) = 0
-    DEG(2,95,12) = 0
-  COEF(2,95) = (2.306245500314138, 0)
-    DEG(2,96,1) = 0
-    DEG(2,96,2) = 1
-    DEG(2,96,3) = 0
-    DEG(2,96,4) = 1
-    DEG(2,96,5) = 0
-    DEG(2,96,6) = 0
-    DEG(2,96,7) = 0
-    DEG(2,96,8) = 0
-    DEG(2,96,9) = 1
-    DEG(2,96,10) = 0
-    DEG(2,96,11) = 0
-    DEG(2,96,12) = 0
-  COEF(2,96) = (-0.8590738977998768, 0)
-    DEG(2,97,1) = 0
-    DEG(2,97,2) = 0
-    DEG(2,97,3) = 1
-    DEG(2,97,4) = 1
-    DEG(2,97,5) = 0
-    DEG(2,97,6) = 0
-    DEG(2,97,7) = 0
-    DEG(2,97,8) = 0
-    DEG(2,97,9) = 1
-    DEG(2,97,10) = 0
-    DEG(2,97,11) = 0
-    DEG(2,97,12) = 0
-  COEF(2,97) = (0.2813594271590863, 0)
-    DEG(2,98,1) = 0
-    DEG(2,98,2) = 0
-    DEG(2,98,3) = 0
-    DEG(2,98,4) = 2
-    DEG(2,98,5) = 0
-    DEG(2,98,6) = 0
-    DEG(2,98,7) = 0
-    DEG(2,98,8) = 0
-    DEG(2,98,9) = 1
-    DEG(2,98,10) = 0
-    DEG(2,98,11) = 0
-    DEG(2,98,12) = 0
-  COEF(2,98) = (-1.153122750157069, 0)
-    DEG(2,99,1) = 1
-    DEG(2,99,2) = 0
-    DEG(2,99,3) = 0
-    DEG(2,99,4) = 0
-    DEG(2,99,5) = 1
-    DEG(2,99,6) = 0
-    DEG(2,99,7) = 0
-    DEG(2,99,8) = 0
-    DEG(2,99,9) = 1
-    DEG(2,99,10) = 0
-    DEG(2,99,11) = 0
-    DEG(2,99,12) = 0
-  COEF(2,99) = (-0.8590738977998768, 0)
-    DEG(2,100,1) = 0
-    DEG(2,100,2) = 1
-    DEG(2,100,3) = 0
-    DEG(2,100,4) = 0
-    DEG(2,100,5) = 1
-    DEG(2,100,6) = 0
-    DEG(2,100,7) = 0
-    DEG(2,100,8) = 0
-    DEG(2,100,9) = 1
-    DEG(2,100,10) = 0
-    DEG(2,100,11) = 0
-    DEG(2,100,12) = 0
-  COEF(2,100) = (1.1816071471760534, 0)
-    DEG(2,101,1) = 0
-    DEG(2,101,2) = 0
-    DEG(2,101,3) = 1
-    DEG(2,101,4) = 0
-    DEG(2,101,5) = 1
-    DEG(2,101,6) = 0
-    DEG(2,101,7) = 0
-    DEG(2,101,8) = 0
-    DEG(2,101,9) = 1
-    DEG(2,101,10) = 0
-    DEG(2,101,11) = 0
-    DEG(2,101,12) = 0
-  COEF(2,101) = (1.8960872448082733, 0)
-    DEG(2,102,1) = 0
-    DEG(2,102,2) = 0
-    DEG(2,102,3) = 0
-    DEG(2,102,4) = 1
-    DEG(2,102,5) = 1
-    DEG(2,102,6) = 0
-    DEG(2,102,7) = 0
-    DEG(2,102,8) = 0
-    DEG(2,102,9) = 1
-    DEG(2,102,10) = 0
-    DEG(2,102,11) = 0
-    DEG(2,102,12) = 0
-  COEF(2,102) = (0.8590738977998768, 0)
-    DEG(2,103,1) = 0
-    DEG(2,103,2) = 0
-    DEG(2,103,3) = 0
-    DEG(2,103,4) = 0
-    DEG(2,103,5) = 2
-    DEG(2,103,6) = 0
-    DEG(2,103,7) = 0
-    DEG(2,103,8) = 0
-    DEG(2,103,9) = 1
-    DEG(2,103,10) = 0
-    DEG(2,103,11) = 0
-    DEG(2,103,12) = 0
-  COEF(2,103) = (-0.5908035735880267, 0)
-    DEG(2,104,1) = 1
-    DEG(2,104,2) = 0
-    DEG(2,104,3) = 0
-    DEG(2,104,4) = 0
-    DEG(2,104,5) = 0
-    DEG(2,104,6) = 1
-    DEG(2,104,7) = 0
-    DEG(2,104,8) = 0
-    DEG(2,104,9) = 1
-    DEG(2,104,10) = 0
-    DEG(2,104,11) = 0
-    DEG(2,104,12) = 0
-  COEF(2,104) = (0.2813594271590863, 0)
-    DEG(2,105,1) = 0
-    DEG(2,105,2) = 1
-    DEG(2,105,3) = 0
-    DEG(2,105,4) = 0
-    DEG(2,105,5) = 0
-    DEG(2,105,6) = 1
-    DEG(2,105,7) = 0
-    DEG(2,105,8) = 0
-    DEG(2,105,9) = 1
-    DEG(2,105,10) = 0
-    DEG(2,105,11) = 0
-    DEG(2,105,12) = 0
-  COEF(2,105) = (1.8960872448082733, 0)
-    DEG(2,106,1) = 0
-    DEG(2,106,2) = 0
-    DEG(2,106,3) = 1
-    DEG(2,106,4) = 0
-    DEG(2,106,5) = 0
-    DEG(2,106,6) = 1
-    DEG(2,106,7) = 0
-    DEG(2,106,8) = 0
-    DEG(2,106,9) = 1
-    DEG(2,106,10) = 0
-    DEG(2,106,11) = 0
-    DEG(2,106,12) = 0
-  COEF(2,106) = (2.884656177627263, 0)
-    DEG(2,107,1) = 0
-    DEG(2,107,2) = 0
-    DEG(2,107,3) = 0
-    DEG(2,107,4) = 1
-    DEG(2,107,5) = 0
-    DEG(2,107,6) = 1
-    DEG(2,107,7) = 0
-    DEG(2,107,8) = 0
-    DEG(2,107,9) = 1
-    DEG(2,107,10) = 0
-    DEG(2,107,11) = 0
-    DEG(2,107,12) = 0
-  COEF(2,107) = (-0.2813594271590863, 0)
-    DEG(2,108,1) = 0
-    DEG(2,108,2) = 0
-    DEG(2,108,3) = 0
-    DEG(2,108,4) = 0
-    DEG(2,108,5) = 1
-    DEG(2,108,6) = 1
-    DEG(2,108,7) = 0
-    DEG(2,108,8) = 0
-    DEG(2,108,9) = 1
-    DEG(2,108,10) = 0
-    DEG(2,108,11) = 0
-    DEG(2,108,12) = 0
-  COEF(2,108) = (-1.8960872448082733, 0)
-    DEG(2,109,1) = 0
-    DEG(2,109,2) = 0
-    DEG(2,109,3) = 0
-    DEG(2,109,4) = 0
-    DEG(2,109,5) = 0
-    DEG(2,109,6) = 2
-    DEG(2,109,7) = 0
-    DEG(2,109,8) = 0
-    DEG(2,109,9) = 1
-    DEG(2,109,10) = 0
-    DEG(2,109,11) = 0
-    DEG(2,109,12) = 0
-  COEF(2,109) = (-1.4423280888136314, 0)
-    DEG(2,110,1) = 1
-    DEG(2,110,2) = 0
-    DEG(2,110,3) = 0
-    DEG(2,110,4) = 1
-    DEG(2,110,5) = 0
-    DEG(2,110,6) = 0
-    DEG(2,110,7) = 1
-    DEG(2,110,8) = 0
-    DEG(2,110,9) = 1
-    DEG(2,110,10) = 0
-    DEG(2,110,11) = 0
-    DEG(2,110,12) = 0
-  COEF(2,110) = (2.3542324309049985, 0)
-    DEG(2,111,1) = 0
-    DEG(2,111,2) = 1
-    DEG(2,111,3) = 0
-    DEG(2,111,4) = 1
-    DEG(2,111,5) = 0
-    DEG(2,111,6) = 0
-    DEG(2,111,7) = 1
-    DEG(2,111,8) = 0
-    DEG(2,111,9) = 1
-    DEG(2,111,10) = 0
-    DEG(2,111,11) = 0
-    DEG(2,111,12) = 0
-  COEF(2,111) = (-0.8541053598798467, 0)
-    DEG(2,112,1) = 0
-    DEG(2,112,2) = 0
-    DEG(2,112,3) = 1
-    DEG(2,112,4) = 1
-    DEG(2,112,5) = 0
-    DEG(2,112,6) = 0
-    DEG(2,112,7) = 1
-    DEG(2,112,8) = 0
-    DEG(2,112,9) = 1
-    DEG(2,112,10) = 0
-    DEG(2,112,11) = 0
-    DEG(2,112,12) = 0
-  COEF(2,112) = (0.4464566692058247, 0)
-    DEG(2,113,1) = 0
-    DEG(2,113,2) = 0
-    DEG(2,113,3) = 0
-    DEG(2,113,4) = 2
-    DEG(2,113,5) = 0
-    DEG(2,113,6) = 0
-    DEG(2,113,7) = 1
-    DEG(2,113,8) = 0
-    DEG(2,113,9) = 1
-    DEG(2,113,10) = 0
-    DEG(2,113,11) = 0
-    DEG(2,113,12) = 0
-  COEF(2,113) = (-1.1771162154524992, 0)
-    DEG(2,114,1) = 1
-    DEG(2,114,2) = 0
-    DEG(2,114,3) = 0
-    DEG(2,114,4) = 0
-    DEG(2,114,5) = 1
-    DEG(2,114,6) = 0
-    DEG(2,114,7) = 1
-    DEG(2,114,8) = 0
-    DEG(2,114,9) = 1
-    DEG(2,114,10) = 0
-    DEG(2,114,11) = 0
-    DEG(2,114,12) = 0
-  COEF(2,114) = (-0.8541053598798467, 0)
-    DEG(2,115,1) = 0
-    DEG(2,115,2) = 1
-    DEG(2,115,3) = 0
-    DEG(2,115,4) = 0
-    DEG(2,115,5) = 1
-    DEG(2,115,6) = 0
-    DEG(2,115,7) = 1
-    DEG(2,115,8) = 0
-    DEG(2,115,9) = 1
-    DEG(2,115,10) = 0
-    DEG(2,115,11) = 0
-    DEG(2,115,12) = 0
-  COEF(2,115) = (-2.9600116917888912, 0)
-    DEG(2,116,1) = 0
-    DEG(2,116,2) = 0
-    DEG(2,116,3) = 1
-    DEG(2,116,4) = 0
-    DEG(2,116,5) = 1
-    DEG(2,116,6) = 0
-    DEG(2,116,7) = 1
-    DEG(2,116,8) = 0
-    DEG(2,116,9) = 1
-    DEG(2,116,10) = 0
-    DEG(2,116,11) = 0
-    DEG(2,116,12) = 0
-  COEF(2,116) = (-1.5129577174998765, 0)
-    DEG(2,117,1) = 0
-    DEG(2,117,2) = 0
-    DEG(2,117,3) = 0
-    DEG(2,117,4) = 1
-    DEG(2,117,5) = 1
-    DEG(2,117,6) = 0
-    DEG(2,117,7) = 1
-    DEG(2,117,8) = 0
-    DEG(2,117,9) = 1
-    DEG(2,117,10) = 0
-    DEG(2,117,11) = 0
-    DEG(2,117,12) = 0
-  COEF(2,117) = (0.8541053598798467, 0)
-    DEG(2,118,1) = 0
-    DEG(2,118,2) = 0
-    DEG(2,118,3) = 0
-    DEG(2,118,4) = 0
-    DEG(2,118,5) = 2
-    DEG(2,118,6) = 0
-    DEG(2,118,7) = 1
-    DEG(2,118,8) = 0
-    DEG(2,118,9) = 1
-    DEG(2,118,10) = 0
-    DEG(2,118,11) = 0
-    DEG(2,118,12) = 0
-  COEF(2,118) = (1.4800058458944456, 0)
-    DEG(2,119,1) = 1
-    DEG(2,119,2) = 0
-    DEG(2,119,3) = 0
-    DEG(2,119,4) = 0
-    DEG(2,119,5) = 0
-    DEG(2,119,6) = 1
-    DEG(2,119,7) = 1
-    DEG(2,119,8) = 0
-    DEG(2,119,9) = 1
-    DEG(2,119,10) = 0
-    DEG(2,119,11) = 0
-    DEG(2,119,12) = 0
-  COEF(2,119) = (0.4464566692058247, 0)
-    DEG(2,120,1) = 0
-    DEG(2,120,2) = 1
-    DEG(2,120,3) = 0
-    DEG(2,120,4) = 0
-    DEG(2,120,5) = 0
-    DEG(2,120,6) = 1
-    DEG(2,120,7) = 1
-    DEG(2,120,8) = 0
-    DEG(2,120,9) = 1
-    DEG(2,120,10) = 0
-    DEG(2,120,11) = 0
-    DEG(2,120,12) = 0
-  COEF(2,120) = (-1.5129577174998765, 0)
-    DEG(2,121,1) = 0
-    DEG(2,121,2) = 0
-    DEG(2,121,3) = 1
-    DEG(2,121,4) = 0
-    DEG(2,121,5) = 0
-    DEG(2,121,6) = 1
-    DEG(2,121,7) = 1
-    DEG(2,121,8) = 0
-    DEG(2,121,9) = 1
-    DEG(2,121,10) = 0
-    DEG(2,121,11) = 0
-    DEG(2,121,12) = 0
-  COEF(2,121) = (0.6057792608838929, 0)
-    DEG(2,122,1) = 0
-    DEG(2,122,2) = 0
-    DEG(2,122,3) = 0
-    DEG(2,122,4) = 1
-    DEG(2,122,5) = 0
-    DEG(2,122,6) = 1
-    DEG(2,122,7) = 1
-    DEG(2,122,8) = 0
-    DEG(2,122,9) = 1
-    DEG(2,122,10) = 0
-    DEG(2,122,11) = 0
-    DEG(2,122,12) = 0
-  COEF(2,122) = (-0.4464566692058247, 0)
-    DEG(2,123,1) = 0
-    DEG(2,123,2) = 0
-    DEG(2,123,3) = 0
-    DEG(2,123,4) = 0
-    DEG(2,123,5) = 1
-    DEG(2,123,6) = 1
-    DEG(2,123,7) = 1
-    DEG(2,123,8) = 0
-    DEG(2,123,9) = 1
-    DEG(2,123,10) = 0
-    DEG(2,123,11) = 0
-    DEG(2,123,12) = 0
-  COEF(2,123) = (1.5129577174998765, 0)
-    DEG(2,124,1) = 0
-    DEG(2,124,2) = 0
-    DEG(2,124,3) = 0
-    DEG(2,124,4) = 0
-    DEG(2,124,5) = 0
-    DEG(2,124,6) = 2
-    DEG(2,124,7) = 1
-    DEG(2,124,8) = 0
-    DEG(2,124,9) = 1
-    DEG(2,124,10) = 0
-    DEG(2,124,11) = 0
-    DEG(2,124,12) = 0
-  COEF(2,124) = (-0.30288963044194644, 0)
-    DEG(2,125,1) = 1
-    DEG(2,125,2) = 0
-    DEG(2,125,3) = 0
-    DEG(2,125,4) = 1
-    DEG(2,125,5) = 0
-    DEG(2,125,6) = 0
-    DEG(2,125,7) = 0
-    DEG(2,125,8) = 1
-    DEG(2,125,9) = 1
-    DEG(2,125,10) = 0
-    DEG(2,125,11) = 0
-    DEG(2,125,12) = 0
-  COEF(2,125) = (-0.6173428261080246, 0)
-    DEG(2,126,1) = 0
-    DEG(2,126,2) = 1
-    DEG(2,126,3) = 0
-    DEG(2,126,4) = 1
-    DEG(2,126,5) = 0
-    DEG(2,126,6) = 0
-    DEG(2,126,7) = 0
-    DEG(2,126,8) = 1
-    DEG(2,126,9) = 1
-    DEG(2,126,10) = 0
-    DEG(2,126,11) = 0
-    DEG(2,126,12) = 0
-  COEF(2,126) = (-1.5730869804855705, 0)
-    DEG(2,127,1) = 0
-    DEG(2,127,2) = 0
-    DEG(2,127,3) = 1
-    DEG(2,127,4) = 1
-    DEG(2,127,5) = 0
-    DEG(2,127,6) = 0
-    DEG(2,127,7) = 0
-    DEG(2,127,8) = 1
-    DEG(2,127,9) = 1
-    DEG(2,127,10) = 0
-    DEG(2,127,11) = 0
-    DEG(2,127,12) = 0
-  COEF(2,127) = (-0.16757355792587186, 0)
-    DEG(2,128,1) = 0
-    DEG(2,128,2) = 0
-    DEG(2,128,3) = 0
-    DEG(2,128,4) = 2
-    DEG(2,128,5) = 0
-    DEG(2,128,6) = 0
-    DEG(2,128,7) = 0
-    DEG(2,128,8) = 1
-    DEG(2,128,9) = 1
-    DEG(2,128,10) = 0
-    DEG(2,128,11) = 0
-    DEG(2,128,12) = 0
-  COEF(2,128) = (0.3086714130540123, 0)
-    DEG(2,129,1) = 1
-    DEG(2,129,2) = 0
-    DEG(2,129,3) = 0
-    DEG(2,129,4) = 0
-    DEG(2,129,5) = 1
-    DEG(2,129,6) = 0
-    DEG(2,129,7) = 0
-    DEG(2,129,8) = 1
-    DEG(2,129,9) = 1
-    DEG(2,129,10) = 0
-    DEG(2,129,11) = 0
-    DEG(2,129,12) = 0
-  COEF(2,129) = (-1.5730869804855705, 0)
-    DEG(2,130,1) = 0
-    DEG(2,130,2) = 1
-    DEG(2,130,3) = 0
-    DEG(2,130,4) = 0
-    DEG(2,130,5) = 1
-    DEG(2,130,6) = 0
-    DEG(2,130,7) = 0
-    DEG(2,130,8) = 1
-    DEG(2,130,9) = 1
-    DEG(2,130,10) = 0
-    DEG(2,130,11) = 0
-    DEG(2,130,12) = 0
-  COEF(2,130) = (0.37735576686189715, 0)
-    DEG(2,131,1) = 0
-    DEG(2,131,2) = 0
-    DEG(2,131,3) = 1
-    DEG(2,131,4) = 0
-    DEG(2,131,5) = 1
-    DEG(2,131,6) = 0
-    DEG(2,131,7) = 0
-    DEG(2,131,8) = 1
-    DEG(2,131,9) = 1
-    DEG(2,131,10) = 0
-    DEG(2,131,11) = 0
-    DEG(2,131,12) = 0
-  COEF(2,131) = (-1.3249097457300787, 0)
-    DEG(2,132,1) = 0
-    DEG(2,132,2) = 0
-    DEG(2,132,3) = 0
-    DEG(2,132,4) = 1
-    DEG(2,132,5) = 1
-    DEG(2,132,6) = 0
-    DEG(2,132,7) = 0
-    DEG(2,132,8) = 1
-    DEG(2,132,9) = 1
-    DEG(2,132,10) = 0
-    DEG(2,132,11) = 0
-    DEG(2,132,12) = 0
-  COEF(2,132) = (1.5730869804855705, 0)
-    DEG(2,133,1) = 0
-    DEG(2,133,2) = 0
-    DEG(2,133,3) = 0
-    DEG(2,133,4) = 0
-    DEG(2,133,5) = 2
-    DEG(2,133,6) = 0
-    DEG(2,133,7) = 0
-    DEG(2,133,8) = 1
-    DEG(2,133,9) = 1
-    DEG(2,133,10) = 0
-    DEG(2,133,11) = 0
-    DEG(2,133,12) = 0
-  COEF(2,133) = (-0.18867788343094857, 0)
-    DEG(2,134,1) = 1
-    DEG(2,134,2) = 0
-    DEG(2,134,3) = 0
-    DEG(2,134,4) = 0
-    DEG(2,134,5) = 0
-    DEG(2,134,6) = 1
-    DEG(2,134,7) = 0
-    DEG(2,134,8) = 1
-    DEG(2,134,9) = 1
-    DEG(2,134,10) = 0
-    DEG(2,134,11) = 0
-    DEG(2,134,12) = 0
-  COEF(2,134) = (-0.16757355792587186, 0)
-    DEG(2,135,1) = 0
-    DEG(2,135,2) = 1
-    DEG(2,135,3) = 0
-    DEG(2,135,4) = 0
-    DEG(2,135,5) = 0
-    DEG(2,135,6) = 1
-    DEG(2,135,7) = 0
-    DEG(2,135,8) = 1
-    DEG(2,135,9) = 1
-    DEG(2,135,10) = 0
-    DEG(2,135,11) = 0
-    DEG(2,135,12) = 0
-  COEF(2,135) = (-1.3249097457300787, 0)
-    DEG(2,136,1) = 0
-    DEG(2,136,2) = 0
-    DEG(2,136,3) = 1
-    DEG(2,136,4) = 0
-    DEG(2,136,5) = 0
-    DEG(2,136,6) = 1
-    DEG(2,136,7) = 0
-    DEG(2,136,8) = 1
-    DEG(2,136,9) = 1
-    DEG(2,136,10) = 0
-    DEG(2,136,11) = 0
-    DEG(2,136,12) = 0
-  COEF(2,136) = (0.2399870592461275, 0)
-    DEG(2,137,1) = 0
-    DEG(2,137,2) = 0
-    DEG(2,137,3) = 0
-    DEG(2,137,4) = 1
-    DEG(2,137,5) = 0
-    DEG(2,137,6) = 1
-    DEG(2,137,7) = 0
-    DEG(2,137,8) = 1
-    DEG(2,137,9) = 1
-    DEG(2,137,10) = 0
-    DEG(2,137,11) = 0
-    DEG(2,137,12) = 0
-  COEF(2,137) = (0.16757355792587186, 0)
-    DEG(2,138,1) = 0
-    DEG(2,138,2) = 0
-    DEG(2,138,3) = 0
-    DEG(2,138,4) = 0
-    DEG(2,138,5) = 1
-    DEG(2,138,6) = 1
-    DEG(2,138,7) = 0
-    DEG(2,138,8) = 1
-    DEG(2,138,9) = 1
-    DEG(2,138,10) = 0
-    DEG(2,138,11) = 0
-    DEG(2,138,12) = 0
-  COEF(2,138) = (1.3249097457300787, 0)
-    DEG(2,139,1) = 0
-    DEG(2,139,2) = 0
-    DEG(2,139,3) = 0
-    DEG(2,139,4) = 0
-    DEG(2,139,5) = 0
-    DEG(2,139,6) = 2
-    DEG(2,139,7) = 0
-    DEG(2,139,8) = 1
-    DEG(2,139,9) = 1
-    DEG(2,139,10) = 0
-    DEG(2,139,11) = 0
-    DEG(2,139,12) = 0
-  COEF(2,139) = (-0.11999352962306375, 0)
-    DEG(2,140,1) = 1
-    DEG(2,140,2) = 0
-    DEG(2,140,3) = 0
-    DEG(2,140,4) = 1
-    DEG(2,140,5) = 0
-    DEG(2,140,6) = 0
-    DEG(2,140,7) = 0
-    DEG(2,140,8) = 0
-    DEG(2,140,9) = 2
-    DEG(2,140,10) = 0
-    DEG(2,140,11) = 0
-    DEG(2,140,12) = 0
-  COEF(2,140) = (0.20317158031241725, 0)
-    DEG(2,141,1) = 0
-    DEG(2,141,2) = 1
-    DEG(2,141,3) = 0
-    DEG(2,141,4) = 1
-    DEG(2,141,5) = 0
-    DEG(2,141,6) = 0
-    DEG(2,141,7) = 0
-    DEG(2,141,8) = 0
-    DEG(2,141,9) = 2
-    DEG(2,141,10) = 0
-    DEG(2,141,11) = 0
-    DEG(2,141,12) = 0
-  COEF(2,141) = (-1.0116851509607196, 0)
-    DEG(2,142,1) = 0
-    DEG(2,142,2) = 0
-    DEG(2,142,3) = 1
-    DEG(2,142,4) = 1
-    DEG(2,142,5) = 0
-    DEG(2,142,6) = 0
-    DEG(2,142,7) = 0
-    DEG(2,142,8) = 0
-    DEG(2,142,9) = 2
-    DEG(2,142,10) = 0
-    DEG(2,142,11) = 0
-    DEG(2,142,12) = 0
-  COEF(2,142) = (-0.8911765986093744, 0)
-    DEG(2,143,1) = 0
-    DEG(2,143,2) = 0
-    DEG(2,143,3) = 0
-    DEG(2,143,4) = 2
-    DEG(2,143,5) = 0
-    DEG(2,143,6) = 0
-    DEG(2,143,7) = 0
-    DEG(2,143,8) = 0
-    DEG(2,143,9) = 2
-    DEG(2,143,10) = 0
-    DEG(2,143,11) = 0
-    DEG(2,143,12) = 0
-  COEF(2,143) = (-0.10158579015620862, 0)
-    DEG(2,144,1) = 1
-    DEG(2,144,2) = 0
-    DEG(2,144,3) = 0
-    DEG(2,144,4) = 0
-    DEG(2,144,5) = 1
-    DEG(2,144,6) = 0
-    DEG(2,144,7) = 0
-    DEG(2,144,8) = 0
-    DEG(2,144,9) = 2
-    DEG(2,144,10) = 0
-    DEG(2,144,11) = 0
-    DEG(2,144,12) = 0
-  COEF(2,144) = (-1.0116851509607196, 0)
-    DEG(2,145,1) = 0
-    DEG(2,145,2) = 1
-    DEG(2,145,3) = 0
-    DEG(2,145,4) = 0
-    DEG(2,145,5) = 1
-    DEG(2,145,6) = 0
-    DEG(2,145,7) = 0
-    DEG(2,145,8) = 0
-    DEG(2,145,9) = 2
-    DEG(2,145,10) = 0
-    DEG(2,145,11) = 0
-    DEG(2,145,12) = 0
-  COEF(2,145) = (0.793564535314908, 0)
-    DEG(2,146,1) = 0
-    DEG(2,146,2) = 0
-    DEG(2,146,3) = 1
-    DEG(2,146,4) = 0
-    DEG(2,146,5) = 1
-    DEG(2,146,6) = 0
-    DEG(2,146,7) = 0
-    DEG(2,146,8) = 0
-    DEG(2,146,9) = 2
-    DEG(2,146,10) = 0
-    DEG(2,146,11) = 0
-    DEG(2,146,12) = 0
-  COEF(2,146) = (-0.12534791897504066, 0)
-    DEG(2,147,1) = 0
-    DEG(2,147,2) = 0
-    DEG(2,147,3) = 0
-    DEG(2,147,4) = 1
-    DEG(2,147,5) = 1
-    DEG(2,147,6) = 0
-    DEG(2,147,7) = 0
-    DEG(2,147,8) = 0
-    DEG(2,147,9) = 2
-    DEG(2,147,10) = 0
-    DEG(2,147,11) = 0
-    DEG(2,147,12) = 0
-  COEF(2,147) = (1.0116851509607196, 0)
-    DEG(2,148,1) = 0
-    DEG(2,148,2) = 0
-    DEG(2,148,3) = 0
-    DEG(2,148,4) = 0
-    DEG(2,148,5) = 2
-    DEG(2,148,6) = 0
-    DEG(2,148,7) = 0
-    DEG(2,148,8) = 0
-    DEG(2,148,9) = 2
-    DEG(2,148,10) = 0
-    DEG(2,148,11) = 0
-    DEG(2,148,12) = 0
-  COEF(2,148) = (-0.396782267657454, 0)
-    DEG(2,149,1) = 1
-    DEG(2,149,2) = 0
-    DEG(2,149,3) = 0
-    DEG(2,149,4) = 0
-    DEG(2,149,5) = 0
-    DEG(2,149,6) = 1
-    DEG(2,149,7) = 0
-    DEG(2,149,8) = 0
-    DEG(2,149,9) = 2
-    DEG(2,149,10) = 0
-    DEG(2,149,11) = 0
-    DEG(2,149,12) = 0
-  COEF(2,149) = (-0.8911765986093744, 0)
-    DEG(2,150,1) = 0
-    DEG(2,150,2) = 1
-    DEG(2,150,3) = 0
-    DEG(2,150,4) = 0
-    DEG(2,150,5) = 0
-    DEG(2,150,6) = 1
-    DEG(2,150,7) = 0
-    DEG(2,150,8) = 0
-    DEG(2,150,9) = 2
-    DEG(2,150,10) = 0
-    DEG(2,150,11) = 0
-    DEG(2,150,12) = 0
-  COEF(2,150) = (-0.12534791897504066, 0)
-    DEG(2,151,1) = 0
-    DEG(2,151,2) = 0
-    DEG(2,151,3) = 1
-    DEG(2,151,4) = 0
-    DEG(2,151,5) = 0
-    DEG(2,151,6) = 1
-    DEG(2,151,7) = 0
-    DEG(2,151,8) = 0
-    DEG(2,151,9) = 2
-    DEG(2,151,10) = 0
-    DEG(2,151,11) = 0
-    DEG(2,151,12) = 0
-  COEF(2,151) = (-0.9967361156273252, 0)
-    DEG(2,152,1) = 0
-    DEG(2,152,2) = 0
-    DEG(2,152,3) = 0
-    DEG(2,152,4) = 1
-    DEG(2,152,5) = 0
-    DEG(2,152,6) = 1
-    DEG(2,152,7) = 0
-    DEG(2,152,8) = 0
-    DEG(2,152,9) = 2
-    DEG(2,152,10) = 0
-    DEG(2,152,11) = 0
-    DEG(2,152,12) = 0
-  COEF(2,152) = (0.8911765986093744, 0)
-    DEG(2,153,1) = 0
-    DEG(2,153,2) = 0
-    DEG(2,153,3) = 0
-    DEG(2,153,4) = 0
-    DEG(2,153,5) = 1
-    DEG(2,153,6) = 1
-    DEG(2,153,7) = 0
-    DEG(2,153,8) = 0
-    DEG(2,153,9) = 2
-    DEG(2,153,10) = 0
-    DEG(2,153,11) = 0
-    DEG(2,153,12) = 0
-  COEF(2,153) = (0.12534791897504066, 0)
-    DEG(2,154,1) = 0
-    DEG(2,154,2) = 0
-    DEG(2,154,3) = 0
-    DEG(2,154,4) = 0
-    DEG(2,154,5) = 0
-    DEG(2,154,6) = 2
-    DEG(2,154,7) = 0
-    DEG(2,154,8) = 0
-    DEG(2,154,9) = 2
-    DEG(2,154,10) = 0
-    DEG(2,154,11) = 0
-    DEG(2,154,12) = 0
-  COEF(2,154) = (0.4983680578136626, 0)
-    DEG(2,155,1) = 0
-    DEG(2,155,2) = 0
-    DEG(2,155,3) = 0
-    DEG(2,155,4) = 0
-    DEG(2,155,5) = 0
-    DEG(2,155,6) = 0
-    DEG(2,155,7) = 0
-    DEG(2,155,8) = 0
-    DEG(2,155,9) = 0
-    DEG(2,155,10) = 1
-    DEG(2,155,11) = 0
-    DEG(2,155,12) = 0
-  COEF(2,155) = (-1.152398411039194, 0)
-    DEG(2,156,1) = 1
-    DEG(2,156,2) = 0
-    DEG(2,156,3) = 0
-    DEG(2,156,4) = 1
-    DEG(2,156,5) = 0
-    DEG(2,156,6) = 0
-    DEG(2,156,7) = 0
-    DEG(2,156,8) = 0
-    DEG(2,156,9) = 0
-    DEG(2,156,10) = 1
-    DEG(2,156,11) = 0
-    DEG(2,156,12) = 0
-  COEF(2,156) = (1.152398411039194, 0)
-    DEG(2,157,1) = 1
-    DEG(2,157,2) = 0
-    DEG(2,157,3) = 0
-    DEG(2,157,4) = 0
-    DEG(2,157,5) = 1
-    DEG(2,157,6) = 0
-    DEG(2,157,7) = 0
-    DEG(2,157,8) = 0
-    DEG(2,157,9) = 0
-    DEG(2,157,10) = 1
-    DEG(2,157,11) = 0
-    DEG(2,157,12) = 0
-  COEF(2,157) = (-1.1832095694746985, 0)
-    DEG(2,158,1) = 1
-    DEG(2,158,2) = 0
-    DEG(2,158,3) = 0
-    DEG(2,158,4) = 0
-    DEG(2,158,5) = 0
-    DEG(2,158,6) = 1
-    DEG(2,158,7) = 0
-    DEG(2,158,8) = 0
-    DEG(2,158,9) = 0
-    DEG(2,158,10) = 1
-    DEG(2,158,11) = 0
-    DEG(2,158,12) = 0
-  COEF(2,158) = (-1.8651898695726326, 0)
-    DEG(2,159,1) = 0
-    DEG(2,159,2) = 0
-    DEG(2,159,3) = 0
-    DEG(2,159,4) = 0
-    DEG(2,159,5) = 0
-    DEG(2,159,6) = 0
-    DEG(2,159,7) = 1
-    DEG(2,159,8) = 0
-    DEG(2,159,9) = 0
-    DEG(2,159,10) = 1
-    DEG(2,159,11) = 0
-    DEG(2,159,12) = 0
-  COEF(2,159) = (-0.5258206400233919, 0)
-    DEG(2,160,1) = 1
-    DEG(2,160,2) = 0
-    DEG(2,160,3) = 0
-    DEG(2,160,4) = 1
-    DEG(2,160,5) = 0
-    DEG(2,160,6) = 0
-    DEG(2,160,7) = 1
-    DEG(2,160,8) = 0
-    DEG(2,160,9) = 0
-    DEG(2,160,10) = 1
-    DEG(2,160,11) = 0
-    DEG(2,160,12) = 0
-  COEF(2,160) = (0.5258206400233919, 0)
-    DEG(2,161,1) = 1
-    DEG(2,161,2) = 0
-    DEG(2,161,3) = 0
-    DEG(2,161,4) = 0
-    DEG(2,161,5) = 1
-    DEG(2,161,6) = 0
-    DEG(2,161,7) = 1
-    DEG(2,161,8) = 0
-    DEG(2,161,9) = 0
-    DEG(2,161,10) = 1
-    DEG(2,161,11) = 0
-    DEG(2,161,12) = 0
-  COEF(2,161) = (2.472879456680566, 0)
-    DEG(2,162,1) = 1
-    DEG(2,162,2) = 0
-    DEG(2,162,3) = 0
-    DEG(2,162,4) = 0
-    DEG(2,162,5) = 0
-    DEG(2,162,6) = 1
-    DEG(2,162,7) = 1
-    DEG(2,162,8) = 0
-    DEG(2,162,9) = 0
-    DEG(2,162,10) = 1
-    DEG(2,162,11) = 0
-    DEG(2,162,12) = 0
-  COEF(2,162) = (-0.32747157604731575, 0)
-    DEG(2,163,1) = 0
-    DEG(2,163,2) = 0
-    DEG(2,163,3) = 0
-    DEG(2,163,4) = 0
-    DEG(2,163,5) = 0
-    DEG(2,163,6) = 0
-    DEG(2,163,7) = 0
-    DEG(2,163,8) = 1
-    DEG(2,163,9) = 0
-    DEG(2,163,10) = 1
-    DEG(2,163,11) = 0
-    DEG(2,163,12) = 0
-  COEF(2,163) = (-1.7725957474565803, 0)
-    DEG(2,164,1) = 1
-    DEG(2,164,2) = 0
-    DEG(2,164,3) = 0
-    DEG(2,164,4) = 1
-    DEG(2,164,5) = 0
-    DEG(2,164,6) = 0
-    DEG(2,164,7) = 0
-    DEG(2,164,8) = 1
-    DEG(2,164,9) = 0
-    DEG(2,164,10) = 1
-    DEG(2,164,11) = 0
-    DEG(2,164,12) = 0
-  COEF(2,164) = (1.7725957474565803, 0)
-    DEG(2,165,1) = 1
-    DEG(2,165,2) = 0
-    DEG(2,165,3) = 0
-    DEG(2,165,4) = 0
-    DEG(2,165,5) = 1
-    DEG(2,165,6) = 0
-    DEG(2,165,7) = 0
-    DEG(2,165,8) = 1
-    DEG(2,165,9) = 0
-    DEG(2,165,10) = 1
-    DEG(2,165,11) = 0
-    DEG(2,165,12) = 0
-  COEF(2,165) = (0.10875413560749447, 0)
-    DEG(2,166,1) = 1
-    DEG(2,166,2) = 0
-    DEG(2,166,3) = 0
-    DEG(2,166,4) = 0
-    DEG(2,166,5) = 0
-    DEG(2,166,6) = 1
-    DEG(2,166,7) = 0
-    DEG(2,166,8) = 1
-    DEG(2,166,9) = 0
-    DEG(2,166,10) = 1
-    DEG(2,166,11) = 0
-    DEG(2,166,12) = 0
-  COEF(2,166) = (0.7474445553401834, 0)
-    DEG(2,167,1) = 0
-    DEG(2,167,2) = 0
-    DEG(2,167,3) = 0
-    DEG(2,167,4) = 0
-    DEG(2,167,5) = 0
-    DEG(2,167,6) = 0
-    DEG(2,167,7) = 0
-    DEG(2,167,8) = 0
-    DEG(2,167,9) = 1
-    DEG(2,167,10) = 1
-    DEG(2,167,11) = 0
-    DEG(2,167,12) = 0
-  COEF(2,167) = (-1.529005786007851, 0)
-    DEG(2,168,1) = 1
-    DEG(2,168,2) = 0
-    DEG(2,168,3) = 0
-    DEG(2,168,4) = 1
-    DEG(2,168,5) = 0
-    DEG(2,168,6) = 0
-    DEG(2,168,7) = 0
-    DEG(2,168,8) = 0
-    DEG(2,168,9) = 1
-    DEG(2,168,10) = 1
-    DEG(2,168,11) = 0
-    DEG(2,168,12) = 0
-  COEF(2,168) = (1.529005786007851, 0)
-    DEG(2,169,1) = 1
-    DEG(2,169,2) = 0
-    DEG(2,169,3) = 0
-    DEG(2,169,4) = 0
-    DEG(2,169,5) = 1
-    DEG(2,169,6) = 0
-    DEG(2,169,7) = 0
-    DEG(2,169,8) = 0
-    DEG(2,169,9) = 1
-    DEG(2,169,10) = 1
-    DEG(2,169,11) = 0
-    DEG(2,169,12) = 0
-  COEF(2,169) = (-0.6253574609396935, 0)
-    DEG(2,170,1) = 1
-    DEG(2,170,2) = 0
-    DEG(2,170,3) = 0
-    DEG(2,170,4) = 0
-    DEG(2,170,5) = 0
-    DEG(2,170,6) = 1
-    DEG(2,170,7) = 0
-    DEG(2,170,8) = 0
-    DEG(2,170,9) = 1
-    DEG(2,170,10) = 1
-    DEG(2,170,11) = 0
-    DEG(2,170,12) = 0
-  COEF(2,170) = (0.8065590077487689, 0)
-    DEG(2,171,1) = 0
-    DEG(2,171,2) = 0
-    DEG(2,171,3) = 0
-    DEG(2,171,4) = 0
-    DEG(2,171,5) = 0
-    DEG(2,171,6) = 0
-    DEG(2,171,7) = 0
-    DEG(2,171,8) = 0
-    DEG(2,171,9) = 0
-    DEG(2,171,10) = 0
-    DEG(2,171,11) = 1
-    DEG(2,171,12) = 0
-  COEF(2,171) = (1.1832095694746985, 0)
-    DEG(2,172,1) = 0
-    DEG(2,172,2) = 1
-    DEG(2,172,3) = 0
-    DEG(2,172,4) = 1
-    DEG(2,172,5) = 0
-    DEG(2,172,6) = 0
-    DEG(2,172,7) = 0
-    DEG(2,172,8) = 0
-    DEG(2,172,9) = 0
-    DEG(2,172,10) = 0
-    DEG(2,172,11) = 1
-    DEG(2,172,12) = 0
-  COEF(2,172) = (1.152398411039194, 0)
-    DEG(2,173,1) = 0
-    DEG(2,173,2) = 1
-    DEG(2,173,3) = 0
-    DEG(2,173,4) = 0
-    DEG(2,173,5) = 1
-    DEG(2,173,6) = 0
-    DEG(2,173,7) = 0
-    DEG(2,173,8) = 0
-    DEG(2,173,9) = 0
-    DEG(2,173,10) = 0
-    DEG(2,173,11) = 1
-    DEG(2,173,12) = 0
-  COEF(2,173) = (-1.1832095694746985, 0)
-    DEG(2,174,1) = 0
-    DEG(2,174,2) = 1
-    DEG(2,174,3) = 0
-    DEG(2,174,4) = 0
-    DEG(2,174,5) = 0
-    DEG(2,174,6) = 1
-    DEG(2,174,7) = 0
-    DEG(2,174,8) = 0
-    DEG(2,174,9) = 0
-    DEG(2,174,10) = 0
-    DEG(2,174,11) = 1
-    DEG(2,174,12) = 0
-  COEF(2,174) = (-1.8651898695726326, 0)
-    DEG(2,175,1) = 0
-    DEG(2,175,2) = 0
-    DEG(2,175,3) = 0
-    DEG(2,175,4) = 0
-    DEG(2,175,5) = 0
-    DEG(2,175,6) = 0
-    DEG(2,175,7) = 1
-    DEG(2,175,8) = 0
-    DEG(2,175,9) = 0
-    DEG(2,175,10) = 0
-    DEG(2,175,11) = 1
-    DEG(2,175,12) = 0
-  COEF(2,175) = (-2.472879456680566, 0)
-    DEG(2,176,1) = 0
-    DEG(2,176,2) = 1
-    DEG(2,176,3) = 0
-    DEG(2,176,4) = 1
-    DEG(2,176,5) = 0
-    DEG(2,176,6) = 0
-    DEG(2,176,7) = 1
-    DEG(2,176,8) = 0
-    DEG(2,176,9) = 0
-    DEG(2,176,10) = 0
-    DEG(2,176,11) = 1
-    DEG(2,176,12) = 0
-  COEF(2,176) = (0.5258206400233919, 0)
-    DEG(2,177,1) = 0
-    DEG(2,177,2) = 1
-    DEG(2,177,3) = 0
-    DEG(2,177,4) = 0
-    DEG(2,177,5) = 1
-    DEG(2,177,6) = 0
-    DEG(2,177,7) = 1
-    DEG(2,177,8) = 0
-    DEG(2,177,9) = 0
-    DEG(2,177,10) = 0
-    DEG(2,177,11) = 1
-    DEG(2,177,12) = 0
-  COEF(2,177) = (2.472879456680566, 0)
-    DEG(2,178,1) = 0
-    DEG(2,178,2) = 1
-    DEG(2,178,3) = 0
-    DEG(2,178,4) = 0
-    DEG(2,178,5) = 0
-    DEG(2,178,6) = 1
-    DEG(2,178,7) = 1
-    DEG(2,178,8) = 0
-    DEG(2,178,9) = 0
-    DEG(2,178,10) = 0
-    DEG(2,178,11) = 1
-    DEG(2,178,12) = 0
-  COEF(2,178) = (-0.32747157604731575, 0)
-    DEG(2,179,1) = 0
-    DEG(2,179,2) = 0
-    DEG(2,179,3) = 0
-    DEG(2,179,4) = 0
-    DEG(2,179,5) = 0
-    DEG(2,179,6) = 0
-    DEG(2,179,7) = 0
-    DEG(2,179,8) = 1
-    DEG(2,179,9) = 0
-    DEG(2,179,10) = 0
-    DEG(2,179,11) = 1
-    DEG(2,179,12) = 0
-  COEF(2,179) = (-0.10875413560749447, 0)
-    DEG(2,180,1) = 0
-    DEG(2,180,2) = 1
-    DEG(2,180,3) = 0
-    DEG(2,180,4) = 1
-    DEG(2,180,5) = 0
-    DEG(2,180,6) = 0
-    DEG(2,180,7) = 0
-    DEG(2,180,8) = 1
-    DEG(2,180,9) = 0
-    DEG(2,180,10) = 0
-    DEG(2,180,11) = 1
-    DEG(2,180,12) = 0
-  COEF(2,180) = (1.7725957474565803, 0)
-    DEG(2,181,1) = 0
-    DEG(2,181,2) = 1
-    DEG(2,181,3) = 0
-    DEG(2,181,4) = 0
-    DEG(2,181,5) = 1
-    DEG(2,181,6) = 0
-    DEG(2,181,7) = 0
-    DEG(2,181,8) = 1
-    DEG(2,181,9) = 0
-    DEG(2,181,10) = 0
-    DEG(2,181,11) = 1
-    DEG(2,181,12) = 0
-  COEF(2,181) = (0.10875413560749447, 0)
-    DEG(2,182,1) = 0
-    DEG(2,182,2) = 1
-    DEG(2,182,3) = 0
-    DEG(2,182,4) = 0
-    DEG(2,182,5) = 0
-    DEG(2,182,6) = 1
-    DEG(2,182,7) = 0
-    DEG(2,182,8) = 1
-    DEG(2,182,9) = 0
-    DEG(2,182,10) = 0
-    DEG(2,182,11) = 1
-    DEG(2,182,12) = 0
-  COEF(2,182) = (0.7474445553401834, 0)
-    DEG(2,183,1) = 0
-    DEG(2,183,2) = 0
-    DEG(2,183,3) = 0
-    DEG(2,183,4) = 0
-    DEG(2,183,5) = 0
-    DEG(2,183,6) = 0
-    DEG(2,183,7) = 0
-    DEG(2,183,8) = 0
-    DEG(2,183,9) = 1
-    DEG(2,183,10) = 0
-    DEG(2,183,11) = 1
-    DEG(2,183,12) = 0
-  COEF(2,183) = (0.6253574609396935, 0)
-    DEG(2,184,1) = 0
-    DEG(2,184,2) = 1
-    DEG(2,184,3) = 0
-    DEG(2,184,4) = 1
-    DEG(2,184,5) = 0
-    DEG(2,184,6) = 0
-    DEG(2,184,7) = 0
-    DEG(2,184,8) = 0
-    DEG(2,184,9) = 1
-    DEG(2,184,10) = 0
-    DEG(2,184,11) = 1
-    DEG(2,184,12) = 0
-  COEF(2,184) = (1.529005786007851, 0)
-    DEG(2,185,1) = 0
-    DEG(2,185,2) = 1
-    DEG(2,185,3) = 0
-    DEG(2,185,4) = 0
-    DEG(2,185,5) = 1
-    DEG(2,185,6) = 0
-    DEG(2,185,7) = 0
-    DEG(2,185,8) = 0
-    DEG(2,185,9) = 1
-    DEG(2,185,10) = 0
-    DEG(2,185,11) = 1
-    DEG(2,185,12) = 0
-  COEF(2,185) = (-0.6253574609396935, 0)
-    DEG(2,186,1) = 0
-    DEG(2,186,2) = 1
-    DEG(2,186,3) = 0
-    DEG(2,186,4) = 0
-    DEG(2,186,5) = 0
-    DEG(2,186,6) = 1
-    DEG(2,186,7) = 0
-    DEG(2,186,8) = 0
-    DEG(2,186,9) = 1
-    DEG(2,186,10) = 0
-    DEG(2,186,11) = 1
-    DEG(2,186,12) = 0
-  COEF(2,186) = (0.8065590077487689, 0)
-    DEG(2,187,1) = 0
-    DEG(2,187,2) = 0
-    DEG(2,187,3) = 0
-    DEG(2,187,4) = 0
-    DEG(2,187,5) = 0
-    DEG(2,187,6) = 0
-    DEG(2,187,7) = 0
-    DEG(2,187,8) = 0
-    DEG(2,187,9) = 0
-    DEG(2,187,10) = 0
-    DEG(2,187,11) = 0
-    DEG(2,187,12) = 1
-  COEF(2,187) = (1.8651898695726326, 0)
-    DEG(2,188,1) = 0
-    DEG(2,188,2) = 0
-    DEG(2,188,3) = 1
-    DEG(2,188,4) = 1
-    DEG(2,188,5) = 0
-    DEG(2,188,6) = 0
-    DEG(2,188,7) = 0
-    DEG(2,188,8) = 0
-    DEG(2,188,9) = 0
-    DEG(2,188,10) = 0
-    DEG(2,188,11) = 0
-    DEG(2,188,12) = 1
-  COEF(2,188) = (1.152398411039194, 0)
-    DEG(2,189,1) = 0
-    DEG(2,189,2) = 0
-    DEG(2,189,3) = 1
-    DEG(2,189,4) = 0
-    DEG(2,189,5) = 1
-    DEG(2,189,6) = 0
-    DEG(2,189,7) = 0
-    DEG(2,189,8) = 0
-    DEG(2,189,9) = 0
-    DEG(2,189,10) = 0
-    DEG(2,189,11) = 0
-    DEG(2,189,12) = 1
-  COEF(2,189) = (-1.1832095694746985, 0)
-    DEG(2,190,1) = 0
-    DEG(2,190,2) = 0
-    DEG(2,190,3) = 1
-    DEG(2,190,4) = 0
-    DEG(2,190,5) = 0
-    DEG(2,190,6) = 1
-    DEG(2,190,7) = 0
-    DEG(2,190,8) = 0
-    DEG(2,190,9) = 0
-    DEG(2,190,10) = 0
-    DEG(2,190,11) = 0
-    DEG(2,190,12) = 1
-  COEF(2,190) = (-1.8651898695726326, 0)
-    DEG(2,191,1) = 0
-    DEG(2,191,2) = 0
-    DEG(2,191,3) = 0
-    DEG(2,191,4) = 0
-    DEG(2,191,5) = 0
-    DEG(2,191,6) = 0
-    DEG(2,191,7) = 1
-    DEG(2,191,8) = 0
-    DEG(2,191,9) = 0
-    DEG(2,191,10) = 0
-    DEG(2,191,11) = 0
-    DEG(2,191,12) = 1
-  COEF(2,191) = (0.32747157604731575, 0)
-    DEG(2,192,1) = 0
-    DEG(2,192,2) = 0
-    DEG(2,192,3) = 1
-    DEG(2,192,4) = 1
-    DEG(2,192,5) = 0
-    DEG(2,192,6) = 0
-    DEG(2,192,7) = 1
-    DEG(2,192,8) = 0
-    DEG(2,192,9) = 0
-    DEG(2,192,10) = 0
-    DEG(2,192,11) = 0
-    DEG(2,192,12) = 1
-  COEF(2,192) = (0.5258206400233919, 0)
-    DEG(2,193,1) = 0
-    DEG(2,193,2) = 0
-    DEG(2,193,3) = 1
-    DEG(2,193,4) = 0
-    DEG(2,193,5) = 1
-    DEG(2,193,6) = 0
-    DEG(2,193,7) = 1
-    DEG(2,193,8) = 0
-    DEG(2,193,9) = 0
-    DEG(2,193,10) = 0
-    DEG(2,193,11) = 0
-    DEG(2,193,12) = 1
-  COEF(2,193) = (2.472879456680566, 0)
-    DEG(2,194,1) = 0
-    DEG(2,194,2) = 0
-    DEG(2,194,3) = 1
-    DEG(2,194,4) = 0
-    DEG(2,194,5) = 0
-    DEG(2,194,6) = 1
-    DEG(2,194,7) = 1
-    DEG(2,194,8) = 0
-    DEG(2,194,9) = 0
-    DEG(2,194,10) = 0
-    DEG(2,194,11) = 0
-    DEG(2,194,12) = 1
-  COEF(2,194) = (-0.32747157604731575, 0)
-    DEG(2,195,1) = 0
-    DEG(2,195,2) = 0
-    DEG(2,195,3) = 0
-    DEG(2,195,4) = 0
-    DEG(2,195,5) = 0
-    DEG(2,195,6) = 0
-    DEG(2,195,7) = 0
-    DEG(2,195,8) = 1
-    DEG(2,195,9) = 0
-    DEG(2,195,10) = 0
-    DEG(2,195,11) = 0
-    DEG(2,195,12) = 1
-  COEF(2,195) = (-0.7474445553401834, 0)
-    DEG(2,196,1) = 0
-    DEG(2,196,2) = 0
-    DEG(2,196,3) = 1
-    DEG(2,196,4) = 1
-    DEG(2,196,5) = 0
-    DEG(2,196,6) = 0
-    DEG(2,196,7) = 0
-    DEG(2,196,8) = 1
-    DEG(2,196,9) = 0
-    DEG(2,196,10) = 0
-    DEG(2,196,11) = 0
-    DEG(2,196,12) = 1
-  COEF(2,196) = (1.7725957474565803, 0)
-    DEG(2,197,1) = 0
-    DEG(2,197,2) = 0
-    DEG(2,197,3) = 1
-    DEG(2,197,4) = 0
-    DEG(2,197,5) = 1
-    DEG(2,197,6) = 0
-    DEG(2,197,7) = 0
-    DEG(2,197,8) = 1
-    DEG(2,197,9) = 0
-    DEG(2,197,10) = 0
-    DEG(2,197,11) = 0
-    DEG(2,197,12) = 1
-  COEF(2,197) = (0.10875413560749447, 0)
-    DEG(2,198,1) = 0
-    DEG(2,198,2) = 0
-    DEG(2,198,3) = 1
-    DEG(2,198,4) = 0
-    DEG(2,198,5) = 0
-    DEG(2,198,6) = 1
-    DEG(2,198,7) = 0
-    DEG(2,198,8) = 1
-    DEG(2,198,9) = 0
-    DEG(2,198,10) = 0
-    DEG(2,198,11) = 0
-    DEG(2,198,12) = 1
-  COEF(2,198) = (0.7474445553401834, 0)
-    DEG(2,199,1) = 0
-    DEG(2,199,2) = 0
-    DEG(2,199,3) = 0
-    DEG(2,199,4) = 0
-    DEG(2,199,5) = 0
-    DEG(2,199,6) = 0
-    DEG(2,199,7) = 0
-    DEG(2,199,8) = 0
-    DEG(2,199,9) = 1
-    DEG(2,199,10) = 0
-    DEG(2,199,11) = 0
-    DEG(2,199,12) = 1
-  COEF(2,199) = (-0.8065590077487689, 0)
-    DEG(2,200,1) = 0
-    DEG(2,200,2) = 0
-    DEG(2,200,3) = 1
-    DEG(2,200,4) = 1
-    DEG(2,200,5) = 0
-    DEG(2,200,6) = 0
-    DEG(2,200,7) = 0
-    DEG(2,200,8) = 0
-    DEG(2,200,9) = 1
-    DEG(2,200,10) = 0
-    DEG(2,200,11) = 0
-    DEG(2,200,12) = 1
-  COEF(2,200) = (1.529005786007851, 0)
-    DEG(2,201,1) = 0
-    DEG(2,201,2) = 0
-    DEG(2,201,3) = 1
-    DEG(2,201,4) = 0
-    DEG(2,201,5) = 1
-    DEG(2,201,6) = 0
-    DEG(2,201,7) = 0
-    DEG(2,201,8) = 0
-    DEG(2,201,9) = 1
-    DEG(2,201,10) = 0
-    DEG(2,201,11) = 0
-    DEG(2,201,12) = 1
-  COEF(2,201) = (-0.6253574609396935, 0)
-    DEG(2,202,1) = 0
-    DEG(2,202,2) = 0
-    DEG(2,202,3) = 1
-    DEG(2,202,4) = 0
-    DEG(2,202,5) = 0
-    DEG(2,202,6) = 1
-    DEG(2,202,7) = 0
-    DEG(2,202,8) = 0
-    DEG(2,202,9) = 1
-    DEG(2,202,10) = 0
-    DEG(2,202,11) = 0
-    DEG(2,202,12) = 1
-  COEF(2,202) = (0.8065590077487689, 0)
-
-NUM_TERMS(3) = 202
-    DEG(3,1,1) = 0
-    DEG(3,1,2) = 0
-    DEG(3,1,3) = 0
-    DEG(3,1,4) = 0
-    DEG(3,1,5) = 0
-    DEG(3,1,6) = 0
-    DEG(3,1,7) = 0
-    DEG(3,1,8) = 0
-    DEG(3,1,9) = 0
-    DEG(3,1,10) = 0
-    DEG(3,1,11) = 0
-    DEG(3,1,12) = 0
-  COEF(3,1) = (0.04629746950871587, 0)
-    DEG(3,2,1) = 1
-    DEG(3,2,2) = 0
-    DEG(3,2,3) = 0
-    DEG(3,2,4) = 1
-    DEG(3,2,5) = 0
-    DEG(3,2,6) = 0
-    DEG(3,2,7) = 0
-    DEG(3,2,8) = 0
-    DEG(3,2,9) = 0
-    DEG(3,2,10) = 0
-    DEG(3,2,11) = 0
-    DEG(3,2,12) = 0
-  COEF(3,2) = (1.77027884125272, 0)
-    DEG(3,3,1) = 0
-    DEG(3,3,2) = 1
-    DEG(3,3,3) = 0
-    DEG(3,3,4) = 1
-    DEG(3,3,5) = 0
-    DEG(3,3,6) = 0
-    DEG(3,3,7) = 0
-    DEG(3,3,8) = 0
-    DEG(3,3,9) = 0
-    DEG(3,3,10) = 0
-    DEG(3,3,11) = 0
-    DEG(3,3,12) = 0
-  COEF(3,3) = (0.5319733266214619, 0)
-    DEG(3,4,1) = 0
-    DEG(3,4,2) = 0
-    DEG(3,4,3) = 1
-    DEG(3,4,4) = 1
-    DEG(3,4,5) = 0
-    DEG(3,4,6) = 0
-    DEG(3,4,7) = 0
-    DEG(3,4,8) = 0
-    DEG(3,4,9) = 0
-    DEG(3,4,10) = 0
-    DEG(3,4,11) = 0
-    DEG(3,4,12) = 0
-  COEF(3,4) = (-0.24768762551627632, 0)
-    DEG(3,5,1) = 0
-    DEG(3,5,2) = 0
-    DEG(3,5,3) = 0
-    DEG(3,5,4) = 2
-    DEG(3,5,5) = 0
-    DEG(3,5,6) = 0
-    DEG(3,5,7) = 0
-    DEG(3,5,8) = 0
-    DEG(3,5,9) = 0
-    DEG(3,5,10) = 0
-    DEG(3,5,11) = 0
-    DEG(3,5,12) = 0
-  COEF(3,5) = (-0.88513942062636, 0)
-    DEG(3,6,1) = 1
-    DEG(3,6,2) = 0
-    DEG(3,6,3) = 0
-    DEG(3,6,4) = 0
-    DEG(3,6,5) = 1
-    DEG(3,6,6) = 0
-    DEG(3,6,7) = 0
-    DEG(3,6,8) = 0
-    DEG(3,6,9) = 0
-    DEG(3,6,10) = 0
-    DEG(3,6,11) = 0
-    DEG(3,6,12) = 0
-  COEF(3,6) = (0.5319733266214619, 0)
-    DEG(3,7,1) = 0
-    DEG(3,7,2) = 1
-    DEG(3,7,3) = 0
-    DEG(3,7,4) = 0
-    DEG(3,7,5) = 1
-    DEG(3,7,6) = 0
-    DEG(3,7,7) = 0
-    DEG(3,7,8) = 0
-    DEG(3,7,9) = 0
-    DEG(3,7,10) = 0
-    DEG(3,7,11) = 0
-    DEG(3,7,12) = 0
-  COEF(3,7) = (-1.8794150909773877, 0)
-    DEG(3,8,1) = 0
-    DEG(3,8,2) = 0
-    DEG(3,8,3) = 1
-    DEG(3,8,4) = 0
-    DEG(3,8,5) = 1
-    DEG(3,8,6) = 0
-    DEG(3,8,7) = 0
-    DEG(3,8,8) = 0
-    DEG(3,8,9) = 0
-    DEG(3,8,10) = 0
-    DEG(3,8,11) = 0
-    DEG(3,8,12) = 0
-  COEF(3,8) = (0.11776432353409363, 0)
-    DEG(3,9,1) = 0
-    DEG(3,9,2) = 0
-    DEG(3,9,3) = 0
-    DEG(3,9,4) = 1
-    DEG(3,9,5) = 1
-    DEG(3,9,6) = 0
-    DEG(3,9,7) = 0
-    DEG(3,9,8) = 0
-    DEG(3,9,9) = 0
-    DEG(3,9,10) = 0
-    DEG(3,9,11) = 0
-    DEG(3,9,12) = 0
-  COEF(3,9) = (-0.5319733266214619, 0)
-    DEG(3,10,1) = 0
-    DEG(3,10,2) = 0
-    DEG(3,10,3) = 0
-    DEG(3,10,4) = 0
-    DEG(3,10,5) = 2
-    DEG(3,10,6) = 0
-    DEG(3,10,7) = 0
-    DEG(3,10,8) = 0
-    DEG(3,10,9) = 0
-    DEG(3,10,10) = 0
-    DEG(3,10,11) = 0
-    DEG(3,10,12) = 0
-  COEF(3,10) = (0.9397075454886938, 0)
-    DEG(3,11,1) = 1
-    DEG(3,11,2) = 0
-    DEG(3,11,3) = 0
-    DEG(3,11,4) = 0
-    DEG(3,11,5) = 0
-    DEG(3,11,6) = 1
-    DEG(3,11,7) = 0
-    DEG(3,11,8) = 0
-    DEG(3,11,9) = 0
-    DEG(3,11,10) = 0
-    DEG(3,11,11) = 0
-    DEG(3,11,12) = 0
-  COEF(3,11) = (-0.24768762551627632, 0)
-    DEG(3,12,1) = 0
-    DEG(3,12,2) = 1
-    DEG(3,12,3) = 0
-    DEG(3,12,4) = 0
-    DEG(3,12,5) = 0
-    DEG(3,12,6) = 1
-    DEG(3,12,7) = 0
-    DEG(3,12,8) = 0
-    DEG(3,12,9) = 0
-    DEG(3,12,10) = 0
-    DEG(3,12,11) = 0
-    DEG(3,12,12) = 0
-  COEF(3,12) = (0.11776432353409363, 0)
-    DEG(3,13,1) = 0
-    DEG(3,13,2) = 0
-    DEG(3,13,3) = 1
-    DEG(3,13,4) = 0
-    DEG(3,13,5) = 0
-    DEG(3,13,6) = 1
-    DEG(3,13,7) = 0
-    DEG(3,13,8) = 0
-    DEG(3,13,9) = 0
-    DEG(3,13,10) = 0
-    DEG(3,13,11) = 0
-    DEG(3,13,12) = 0
-  COEF(3,13) = (0.016541310707236013, 0)
-    DEG(3,14,1) = 0
-    DEG(3,14,2) = 0
-    DEG(3,14,3) = 0
-    DEG(3,14,4) = 1
-    DEG(3,14,5) = 0
-    DEG(3,14,6) = 1
-    DEG(3,14,7) = 0
-    DEG(3,14,8) = 0
-    DEG(3,14,9) = 0
-    DEG(3,14,10) = 0
-    DEG(3,14,11) = 0
-    DEG(3,14,12) = 0
-  COEF(3,14) = (0.24768762551627632, 0)
-    DEG(3,15,1) = 0
-    DEG(3,15,2) = 0
-    DEG(3,15,3) = 0
-    DEG(3,15,4) = 0
-    DEG(3,15,5) = 1
-    DEG(3,15,6) = 1
-    DEG(3,15,7) = 0
-    DEG(3,15,8) = 0
-    DEG(3,15,9) = 0
-    DEG(3,15,10) = 0
-    DEG(3,15,11) = 0
-    DEG(3,15,12) = 0
-  COEF(3,15) = (-0.11776432353409363, 0)
-    DEG(3,16,1) = 0
-    DEG(3,16,2) = 0
-    DEG(3,16,3) = 0
-    DEG(3,16,4) = 0
-    DEG(3,16,5) = 0
-    DEG(3,16,6) = 2
-    DEG(3,16,7) = 0
-    DEG(3,16,8) = 0
-    DEG(3,16,9) = 0
-    DEG(3,16,10) = 0
-    DEG(3,16,11) = 0
-    DEG(3,16,12) = 0
-  COEF(3,16) = (-0.008270655353618006, 0)
-    DEG(3,17,1) = 0
-    DEG(3,17,2) = 0
-    DEG(3,17,3) = 0
-    DEG(3,17,4) = 0
-    DEG(3,17,5) = 0
-    DEG(3,17,6) = 0
-    DEG(3,17,7) = 1
-    DEG(3,17,8) = 0
-    DEG(3,17,9) = 0
-    DEG(3,17,10) = 0
-    DEG(3,17,11) = 0
-    DEG(3,17,12) = 0
-  COEF(3,17) = (-1.9573416852652301, 0)
-    DEG(3,18,1) = 1
-    DEG(3,18,2) = 0
-    DEG(3,18,3) = 0
-    DEG(3,18,4) = 1
-    DEG(3,18,5) = 0
-    DEG(3,18,6) = 0
-    DEG(3,18,7) = 1
-    DEG(3,18,8) = 0
-    DEG(3,18,9) = 0
-    DEG(3,18,10) = 0
-    DEG(3,18,11) = 0
-    DEG(3,18,12) = 0
-  COEF(3,18) = (2.4089149618776196, 0)
-    DEG(3,19,1) = 0
-    DEG(3,19,2) = 1
-    DEG(3,19,3) = 0
-    DEG(3,19,4) = 1
-    DEG(3,19,5) = 0
-    DEG(3,19,6) = 0
-    DEG(3,19,7) = 1
-    DEG(3,19,8) = 0
-    DEG(3,19,9) = 0
-    DEG(3,19,10) = 0
-    DEG(3,19,11) = 0
-    DEG(3,19,12) = 0
-  COEF(3,19) = (2.285194659661792, 0)
-    DEG(3,20,1) = 0
-    DEG(3,20,2) = 0
-    DEG(3,20,3) = 1
-    DEG(3,20,4) = 1
-    DEG(3,20,5) = 0
-    DEG(3,20,6) = 0
-    DEG(3,20,7) = 1
-    DEG(3,20,8) = 0
-    DEG(3,20,9) = 0
-    DEG(3,20,10) = 0
-    DEG(3,20,11) = 0
-    DEG(3,20,12) = 0
-  COEF(3,20) = (0.014598066084085282, 0)
-    DEG(3,21,1) = 0
-    DEG(3,21,2) = 0
-    DEG(3,21,3) = 0
-    DEG(3,21,4) = 2
-    DEG(3,21,5) = 0
-    DEG(3,21,6) = 0
-    DEG(3,21,7) = 1
-    DEG(3,21,8) = 0
-    DEG(3,21,9) = 0
-    DEG(3,21,10) = 0
-    DEG(3,21,11) = 0
-    DEG(3,21,12) = 0
-  COEF(3,21) = (-1.2044574809388098, 0)
-    DEG(3,22,1) = 1
-    DEG(3,22,2) = 0
-    DEG(3,22,3) = 0
-    DEG(3,22,4) = 0
-    DEG(3,22,5) = 1
-    DEG(3,22,6) = 0
-    DEG(3,22,7) = 1
-    DEG(3,22,8) = 0
-    DEG(3,22,9) = 0
-    DEG(3,22,10) = 0
-    DEG(3,22,11) = 0
-    DEG(3,22,12) = 0
-  COEF(3,22) = (2.285194659661792, 0)
-    DEG(3,23,1) = 0
-    DEG(3,23,2) = 1
-    DEG(3,23,3) = 0
-    DEG(3,23,4) = 0
-    DEG(3,23,5) = 1
-    DEG(3,23,6) = 0
-    DEG(3,23,7) = 1
-    DEG(3,23,8) = 0
-    DEG(3,23,9) = 0
-    DEG(3,23,10) = 0
-    DEG(3,23,11) = 0
-    DEG(3,23,12) = 0
-  COEF(3,23) = (1.447720068673193, 0)
-    DEG(3,24,1) = 0
-    DEG(3,24,2) = 0
-    DEG(3,24,3) = 1
-    DEG(3,24,4) = 0
-    DEG(3,24,5) = 1
-    DEG(3,24,6) = 0
-    DEG(3,24,7) = 1
-    DEG(3,24,8) = 0
-    DEG(3,24,9) = 0
-    DEG(3,24,10) = 0
-    DEG(3,24,11) = 0
-    DEG(3,24,12) = 0
-  COEF(3,24) = (-0.8076247400668448, 0)
-    DEG(3,25,1) = 0
-    DEG(3,25,2) = 0
-    DEG(3,25,3) = 0
-    DEG(3,25,4) = 1
-    DEG(3,25,5) = 1
-    DEG(3,25,6) = 0
-    DEG(3,25,7) = 1
-    DEG(3,25,8) = 0
-    DEG(3,25,9) = 0
-    DEG(3,25,10) = 0
-    DEG(3,25,11) = 0
-    DEG(3,25,12) = 0
-  COEF(3,25) = (-2.285194659661792, 0)
-    DEG(3,26,1) = 0
-    DEG(3,26,2) = 0
-    DEG(3,26,3) = 0
-    DEG(3,26,4) = 0
-    DEG(3,26,5) = 2
-    DEG(3,26,6) = 0
-    DEG(3,26,7) = 1
-    DEG(3,26,8) = 0
-    DEG(3,26,9) = 0
-    DEG(3,26,10) = 0
-    DEG(3,26,11) = 0
-    DEG(3,26,12) = 0
-  COEF(3,26) = (-0.7238600343365965, 0)
-    DEG(3,27,1) = 1
-    DEG(3,27,2) = 0
-    DEG(3,27,3) = 0
-    DEG(3,27,4) = 0
-    DEG(3,27,5) = 0
-    DEG(3,27,6) = 1
-    DEG(3,27,7) = 1
-    DEG(3,27,8) = 0
-    DEG(3,27,9) = 0
-    DEG(3,27,10) = 0
-    DEG(3,27,11) = 0
-    DEG(3,27,12) = 0
-  COEF(3,27) = (0.014598066084085282, 0)
-    DEG(3,28,1) = 0
-    DEG(3,28,2) = 1
-    DEG(3,28,3) = 0
-    DEG(3,28,4) = 0
-    DEG(3,28,5) = 0
-    DEG(3,28,6) = 1
-    DEG(3,28,7) = 1
-    DEG(3,28,8) = 0
-    DEG(3,28,9) = 0
-    DEG(3,28,10) = 0
-    DEG(3,28,11) = 0
-    DEG(3,28,12) = 0
-  COEF(3,28) = (-0.8076247400668448, 0)
-    DEG(3,29,1) = 0
-    DEG(3,29,2) = 0
-    DEG(3,29,3) = 1
-    DEG(3,29,4) = 0
-    DEG(3,29,5) = 0
-    DEG(3,29,6) = 1
-    DEG(3,29,7) = 1
-    DEG(3,29,8) = 0
-    DEG(3,29,9) = 0
-    DEG(3,29,10) = 0
-    DEG(3,29,11) = 0
-    DEG(3,29,12) = 0
-  COEF(3,29) = (0.0580483399796474, 0)
-    DEG(3,30,1) = 0
-    DEG(3,30,2) = 0
-    DEG(3,30,3) = 0
-    DEG(3,30,4) = 1
-    DEG(3,30,5) = 0
-    DEG(3,30,6) = 1
-    DEG(3,30,7) = 1
-    DEG(3,30,8) = 0
-    DEG(3,30,9) = 0
-    DEG(3,30,10) = 0
-    DEG(3,30,11) = 0
-    DEG(3,30,12) = 0
-  COEF(3,30) = (-0.014598066084085282, 0)
-    DEG(3,31,1) = 0
-    DEG(3,31,2) = 0
-    DEG(3,31,3) = 0
-    DEG(3,31,4) = 0
-    DEG(3,31,5) = 1
-    DEG(3,31,6) = 1
-    DEG(3,31,7) = 1
-    DEG(3,31,8) = 0
-    DEG(3,31,9) = 0
-    DEG(3,31,10) = 0
-    DEG(3,31,11) = 0
-    DEG(3,31,12) = 0
-  COEF(3,31) = (0.8076247400668448, 0)
-    DEG(3,32,1) = 0
-    DEG(3,32,2) = 0
-    DEG(3,32,3) = 0
-    DEG(3,32,4) = 0
-    DEG(3,32,5) = 0
-    DEG(3,32,6) = 2
-    DEG(3,32,7) = 1
-    DEG(3,32,8) = 0
-    DEG(3,32,9) = 0
-    DEG(3,32,10) = 0
-    DEG(3,32,11) = 0
-    DEG(3,32,12) = 0
-  COEF(3,32) = (-0.0290241699898237, 0)
-    DEG(3,33,1) = 1
-    DEG(3,33,2) = 0
-    DEG(3,33,3) = 0
-    DEG(3,33,4) = 1
-    DEG(3,33,5) = 0
-    DEG(3,33,6) = 0
-    DEG(3,33,7) = 2
-    DEG(3,33,8) = 0
-    DEG(3,33,9) = 0
-    DEG(3,33,10) = 0
-    DEG(3,33,11) = 0
-    DEG(3,33,12) = 0
-  COEF(3,33) = (0.08193900947623727, 0)
-    DEG(3,34,1) = 0
-    DEG(3,34,2) = 1
-    DEG(3,34,3) = 0
-    DEG(3,34,4) = 1
-    DEG(3,34,5) = 0
-    DEG(3,34,6) = 0
-    DEG(3,34,7) = 2
-    DEG(3,34,8) = 0
-    DEG(3,34,9) = 0
-    DEG(3,34,10) = 0
-    DEG(3,34,11) = 0
-    DEG(3,34,12) = 0
-  COEF(3,34) = (0.16473329677925125, 0)
-    DEG(3,35,1) = 0
-    DEG(3,35,2) = 0
-    DEG(3,35,3) = 1
-    DEG(3,35,4) = 1
-    DEG(3,35,5) = 0
-    DEG(3,35,6) = 0
-    DEG(3,35,7) = 2
-    DEG(3,35,8) = 0
-    DEG(3,35,9) = 0
-    DEG(3,35,10) = 0
-    DEG(3,35,11) = 0
-    DEG(3,35,12) = 0
-  COEF(3,35) = (0.6551165876563525, 0)
-    DEG(3,36,1) = 0
-    DEG(3,36,2) = 0
-    DEG(3,36,3) = 0
-    DEG(3,36,4) = 2
-    DEG(3,36,5) = 0
-    DEG(3,36,6) = 0
-    DEG(3,36,7) = 2
-    DEG(3,36,8) = 0
-    DEG(3,36,9) = 0
-    DEG(3,36,10) = 0
-    DEG(3,36,11) = 0
-    DEG(3,36,12) = 0
-  COEF(3,36) = (-0.04096950473811863, 0)
-    DEG(3,37,1) = 1
-    DEG(3,37,2) = 0
-    DEG(3,37,3) = 0
-    DEG(3,37,4) = 0
-    DEG(3,37,5) = 1
-    DEG(3,37,6) = 0
-    DEG(3,37,7) = 2
-    DEG(3,37,8) = 0
-    DEG(3,37,9) = 0
-    DEG(3,37,10) = 0
-    DEG(3,37,11) = 0
-    DEG(3,37,12) = 0
-  COEF(3,37) = (0.16473329677925125, 0)
-    DEG(3,38,1) = 0
-    DEG(3,38,2) = 1
-    DEG(3,38,3) = 0
-    DEG(3,38,4) = 0
-    DEG(3,38,5) = 1
-    DEG(3,38,6) = 0
-    DEG(3,38,7) = 2
-    DEG(3,38,8) = 0
-    DEG(3,38,9) = 0
-    DEG(3,38,10) = 0
-    DEG(3,38,11) = 0
-    DEG(3,38,12) = 0
-  COEF(3,38) = (0.14452465503199485, 0)
-    DEG(3,39,1) = 0
-    DEG(3,39,2) = 0
-    DEG(3,39,3) = 1
-    DEG(3,39,4) = 0
-    DEG(3,39,5) = 1
-    DEG(3,39,6) = 0
-    DEG(3,39,7) = 2
-    DEG(3,39,8) = 0
-    DEG(3,39,9) = 0
-    DEG(3,39,10) = 0
-    DEG(3,39,11) = 0
-    DEG(3,39,12) = 0
-  COEF(3,39) = (0.30713971021953657, 0)
-    DEG(3,40,1) = 0
-    DEG(3,40,2) = 0
-    DEG(3,40,3) = 0
-    DEG(3,40,4) = 1
-    DEG(3,40,5) = 1
-    DEG(3,40,6) = 0
-    DEG(3,40,7) = 2
-    DEG(3,40,8) = 0
-    DEG(3,40,9) = 0
-    DEG(3,40,10) = 0
-    DEG(3,40,11) = 0
-    DEG(3,40,12) = 0
-  COEF(3,40) = (-0.16473329677925125, 0)
-    DEG(3,41,1) = 0
-    DEG(3,41,2) = 0
-    DEG(3,41,3) = 0
-    DEG(3,41,4) = 0
-    DEG(3,41,5) = 2
-    DEG(3,41,6) = 0
-    DEG(3,41,7) = 2
-    DEG(3,41,8) = 0
-    DEG(3,41,9) = 0
-    DEG(3,41,10) = 0
-    DEG(3,41,11) = 0
-    DEG(3,41,12) = 0
-  COEF(3,41) = (-0.07226232751599743, 0)
-    DEG(3,42,1) = 1
-    DEG(3,42,2) = 0
-    DEG(3,42,3) = 0
-    DEG(3,42,4) = 0
-    DEG(3,42,5) = 0
-    DEG(3,42,6) = 1
-    DEG(3,42,7) = 2
-    DEG(3,42,8) = 0
-    DEG(3,42,9) = 0
-    DEG(3,42,10) = 0
-    DEG(3,42,11) = 0
-    DEG(3,42,12) = 0
-  COEF(3,42) = (0.6551165876563525, 0)
-    DEG(3,43,1) = 0
-    DEG(3,43,2) = 1
-    DEG(3,43,3) = 0
-    DEG(3,43,4) = 0
-    DEG(3,43,5) = 0
-    DEG(3,43,6) = 1
-    DEG(3,43,7) = 2
-    DEG(3,43,8) = 0
-    DEG(3,43,9) = 0
-    DEG(3,43,10) = 0
-    DEG(3,43,11) = 0
-    DEG(3,43,12) = 0
-  COEF(3,43) = (0.30713971021953657, 0)
-    DEG(3,44,1) = 0
-    DEG(3,44,2) = 0
-    DEG(3,44,3) = 1
-    DEG(3,44,4) = 0
-    DEG(3,44,5) = 0
-    DEG(3,44,6) = 1
-    DEG(3,44,7) = 2
-    DEG(3,44,8) = 0
-    DEG(3,44,9) = 0
-    DEG(3,44,10) = 0
-    DEG(3,44,11) = 0
-    DEG(3,44,12) = 0
-  COEF(3,44) = (-0.2264636645082321, 0)
-    DEG(3,45,1) = 0
-    DEG(3,45,2) = 0
-    DEG(3,45,3) = 0
-    DEG(3,45,4) = 1
-    DEG(3,45,5) = 0
-    DEG(3,45,6) = 1
-    DEG(3,45,7) = 2
-    DEG(3,45,8) = 0
-    DEG(3,45,9) = 0
-    DEG(3,45,10) = 0
-    DEG(3,45,11) = 0
-    DEG(3,45,12) = 0
-  COEF(3,45) = (-0.6551165876563525, 0)
-    DEG(3,46,1) = 0
-    DEG(3,46,2) = 0
-    DEG(3,46,3) = 0
-    DEG(3,46,4) = 0
-    DEG(3,46,5) = 1
-    DEG(3,46,6) = 1
-    DEG(3,46,7) = 2
-    DEG(3,46,8) = 0
-    DEG(3,46,9) = 0
-    DEG(3,46,10) = 0
-    DEG(3,46,11) = 0
-    DEG(3,46,12) = 0
-  COEF(3,46) = (-0.30713971021953657, 0)
-    DEG(3,47,1) = 0
-    DEG(3,47,2) = 0
-    DEG(3,47,3) = 0
-    DEG(3,47,4) = 0
-    DEG(3,47,5) = 0
-    DEG(3,47,6) = 2
-    DEG(3,47,7) = 2
-    DEG(3,47,8) = 0
-    DEG(3,47,9) = 0
-    DEG(3,47,10) = 0
-    DEG(3,47,11) = 0
-    DEG(3,47,12) = 0
-  COEF(3,47) = (0.11323183225411605, 0)
-    DEG(3,48,1) = 0
-    DEG(3,48,2) = 0
-    DEG(3,48,3) = 0
-    DEG(3,48,4) = 0
-    DEG(3,48,5) = 0
-    DEG(3,48,6) = 0
-    DEG(3,48,7) = 0
-    DEG(3,48,8) = 1
-    DEG(3,48,9) = 0
-    DEG(3,48,10) = 0
-    DEG(3,48,11) = 0
-    DEG(3,48,12) = 0
-  COEF(3,48) = (1.3032116005934673, 0)
-    DEG(3,49,1) = 1
-    DEG(3,49,2) = 0
-    DEG(3,49,3) = 0
-    DEG(3,49,4) = 1
-    DEG(3,49,5) = 0
-    DEG(3,49,6) = 0
-    DEG(3,49,7) = 0
-    DEG(3,49,8) = 1
-    DEG(3,49,9) = 0
-    DEG(3,49,10) = 0
-    DEG(3,49,11) = 0
-    DEG(3,49,12) = 0
-  COEF(3,49) = (0.5315419895314151, 0)
-    DEG(3,50,1) = 0
-    DEG(3,50,2) = 1
-    DEG(3,50,3) = 0
-    DEG(3,50,4) = 1
-    DEG(3,50,5) = 0
-    DEG(3,50,6) = 0
-    DEG(3,50,7) = 0
-    DEG(3,50,8) = 1
-    DEG(3,50,9) = 0
-    DEG(3,50,10) = 0
-    DEG(3,50,11) = 0
-    DEG(3,50,12) = 0
-  COEF(3,50) = (-0.11170450630228011, 0)
-    DEG(3,51,1) = 0
-    DEG(3,51,2) = 0
-    DEG(3,51,3) = 1
-    DEG(3,51,4) = 1
-    DEG(3,51,5) = 0
-    DEG(3,51,6) = 0
-    DEG(3,51,7) = 0
-    DEG(3,51,8) = 1
-    DEG(3,51,9) = 0
-    DEG(3,51,10) = 0
-    DEG(3,51,11) = 0
-    DEG(3,51,12) = 0
-  COEF(3,51) = (2.1604409866625787, 0)
-    DEG(3,52,1) = 0
-    DEG(3,52,2) = 0
-    DEG(3,52,3) = 0
-    DEG(3,52,4) = 2
-    DEG(3,52,5) = 0
-    DEG(3,52,6) = 0
-    DEG(3,52,7) = 0
-    DEG(3,52,8) = 1
-    DEG(3,52,9) = 0
-    DEG(3,52,10) = 0
-    DEG(3,52,11) = 0
-    DEG(3,52,12) = 0
-  COEF(3,52) = (-0.26577099476570754, 0)
-    DEG(3,53,1) = 1
-    DEG(3,53,2) = 0
-    DEG(3,53,3) = 0
-    DEG(3,53,4) = 0
-    DEG(3,53,5) = 1
-    DEG(3,53,6) = 0
-    DEG(3,53,7) = 0
-    DEG(3,53,8) = 1
-    DEG(3,53,9) = 0
-    DEG(3,53,10) = 0
-    DEG(3,53,11) = 0
-    DEG(3,53,12) = 0
-  COEF(3,53) = (-0.11170450630228011, 0)
-    DEG(3,54,1) = 0
-    DEG(3,54,2) = 1
-    DEG(3,54,3) = 0
-    DEG(3,54,4) = 0
-    DEG(3,54,5) = 1
-    DEG(3,54,6) = 0
-    DEG(3,54,7) = 0
-    DEG(3,54,8) = 1
-    DEG(3,54,9) = 0
-    DEG(3,54,10) = 0
-    DEG(3,54,11) = 0
-    DEG(3,54,12) = 0
-  COEF(3,54) = (-2.893733812670086, 0)
-    DEG(3,55,1) = 0
-    DEG(3,55,2) = 0
-    DEG(3,55,3) = 1
-    DEG(3,55,4) = 0
-    DEG(3,55,5) = 1
-    DEG(3,55,6) = 0
-    DEG(3,55,7) = 0
-    DEG(3,55,8) = 1
-    DEG(3,55,9) = 0
-    DEG(3,55,10) = 0
-    DEG(3,55,11) = 0
-    DEG(3,55,12) = 0
-  COEF(3,55) = (-1.1486610419686747, 0)
-    DEG(3,56,1) = 0
-    DEG(3,56,2) = 0
-    DEG(3,56,3) = 0
-    DEG(3,56,4) = 1
-    DEG(3,56,5) = 1
-    DEG(3,56,6) = 0
-    DEG(3,56,7) = 0
-    DEG(3,56,8) = 1
-    DEG(3,56,9) = 0
-    DEG(3,56,10) = 0
-    DEG(3,56,11) = 0
-    DEG(3,56,12) = 0
-  COEF(3,56) = (0.11170450630228011, 0)
-    DEG(3,57,1) = 0
-    DEG(3,57,2) = 0
-    DEG(3,57,3) = 0
-    DEG(3,57,4) = 0
-    DEG(3,57,5) = 2
-    DEG(3,57,6) = 0
-    DEG(3,57,7) = 0
-    DEG(3,57,8) = 1
-    DEG(3,57,9) = 0
-    DEG(3,57,10) = 0
-    DEG(3,57,11) = 0
-    DEG(3,57,12) = 0
-  COEF(3,57) = (1.446866906335043, 0)
-    DEG(3,58,1) = 1
-    DEG(3,58,2) = 0
-    DEG(3,58,3) = 0
-    DEG(3,58,4) = 0
-    DEG(3,58,5) = 0
-    DEG(3,58,6) = 1
-    DEG(3,58,7) = 0
-    DEG(3,58,8) = 1
-    DEG(3,58,9) = 0
-    DEG(3,58,10) = 0
-    DEG(3,58,11) = 0
-    DEG(3,58,12) = 0
-  COEF(3,58) = (2.1604409866625787, 0)
-    DEG(3,59,1) = 0
-    DEG(3,59,2) = 1
-    DEG(3,59,3) = 0
-    DEG(3,59,4) = 0
-    DEG(3,59,5) = 0
-    DEG(3,59,6) = 1
-    DEG(3,59,7) = 0
-    DEG(3,59,8) = 1
-    DEG(3,59,9) = 0
-    DEG(3,59,10) = 0
-    DEG(3,59,11) = 0
-    DEG(3,59,12) = 0
-  COEF(3,59) = (-1.1486610419686747, 0)
-    DEG(3,60,1) = 0
-    DEG(3,60,2) = 0
-    DEG(3,60,3) = 1
-    DEG(3,60,4) = 0
-    DEG(3,60,5) = 0
-    DEG(3,60,6) = 1
-    DEG(3,60,7) = 0
-    DEG(3,60,8) = 1
-    DEG(3,60,9) = 0
-    DEG(3,60,10) = 0
-    DEG(3,60,11) = 0
-    DEG(3,60,12) = 0
-  COEF(3,60) = (-0.24423137804826375, 0)
-    DEG(3,61,1) = 0
-    DEG(3,61,2) = 0
-    DEG(3,61,3) = 0
-    DEG(3,61,4) = 1
-    DEG(3,61,5) = 0
-    DEG(3,61,6) = 1
-    DEG(3,61,7) = 0
-    DEG(3,61,8) = 1
-    DEG(3,61,9) = 0
-    DEG(3,61,10) = 0
-    DEG(3,61,11) = 0
-    DEG(3,61,12) = 0
-  COEF(3,61) = (-2.1604409866625787, 0)
-    DEG(3,62,1) = 0
-    DEG(3,62,2) = 0
-    DEG(3,62,3) = 0
-    DEG(3,62,4) = 0
-    DEG(3,62,5) = 1
-    DEG(3,62,6) = 1
-    DEG(3,62,7) = 0
-    DEG(3,62,8) = 1
-    DEG(3,62,9) = 0
-    DEG(3,62,10) = 0
-    DEG(3,62,11) = 0
-    DEG(3,62,12) = 0
-  COEF(3,62) = (1.1486610419686747, 0)
-    DEG(3,63,1) = 0
-    DEG(3,63,2) = 0
-    DEG(3,63,3) = 0
-    DEG(3,63,4) = 0
-    DEG(3,63,5) = 0
-    DEG(3,63,6) = 2
-    DEG(3,63,7) = 0
-    DEG(3,63,8) = 1
-    DEG(3,63,9) = 0
-    DEG(3,63,10) = 0
-    DEG(3,63,11) = 0
-    DEG(3,63,12) = 0
-  COEF(3,63) = (0.12211568902413188, 0)
-    DEG(3,64,1) = 1
-    DEG(3,64,2) = 0
-    DEG(3,64,3) = 0
-    DEG(3,64,4) = 1
-    DEG(3,64,5) = 0
-    DEG(3,64,6) = 0
-    DEG(3,64,7) = 1
-    DEG(3,64,8) = 1
-    DEG(3,64,9) = 0
-    DEG(3,64,10) = 0
-    DEG(3,64,11) = 0
-    DEG(3,64,12) = 0
-  COEF(3,64) = (0.2507558557227934, 0)
-    DEG(3,65,1) = 0
-    DEG(3,65,2) = 1
-    DEG(3,65,3) = 0
-    DEG(3,65,4) = 1
-    DEG(3,65,5) = 0
-    DEG(3,65,6) = 0
-    DEG(3,65,7) = 1
-    DEG(3,65,8) = 1
-    DEG(3,65,9) = 0
-    DEG(3,65,10) = 0
-    DEG(3,65,11) = 0
-    DEG(3,65,12) = 0
-  COEF(3,65) = (0.7071409848678237, 0)
-    DEG(3,66,1) = 0
-    DEG(3,66,2) = 0
-    DEG(3,66,3) = 1
-    DEG(3,66,4) = 1
-    DEG(3,66,5) = 0
-    DEG(3,66,6) = 0
-    DEG(3,66,7) = 1
-    DEG(3,66,8) = 1
-    DEG(3,66,9) = 0
-    DEG(3,66,10) = 0
-    DEG(3,66,11) = 0
-    DEG(3,66,12) = 0
-  COEF(3,66) = (2.7705122035898007, 0)
-    DEG(3,67,1) = 0
-    DEG(3,67,2) = 0
-    DEG(3,67,3) = 0
-    DEG(3,67,4) = 2
-    DEG(3,67,5) = 0
-    DEG(3,67,6) = 0
-    DEG(3,67,7) = 1
-    DEG(3,67,8) = 1
-    DEG(3,67,9) = 0
-    DEG(3,67,10) = 0
-    DEG(3,67,11) = 0
-    DEG(3,67,12) = 0
-  COEF(3,67) = (-0.1253779278613967, 0)
-    DEG(3,68,1) = 1
-    DEG(3,68,2) = 0
-    DEG(3,68,3) = 0
-    DEG(3,68,4) = 0
-    DEG(3,68,5) = 1
-    DEG(3,68,6) = 0
-    DEG(3,68,7) = 1
-    DEG(3,68,8) = 1
-    DEG(3,68,9) = 0
-    DEG(3,68,10) = 0
-    DEG(3,68,11) = 0
-    DEG(3,68,12) = 0
-  COEF(3,68) = (0.7071409848678237, 0)
-    DEG(3,69,1) = 0
-    DEG(3,69,2) = 1
-    DEG(3,69,3) = 0
-    DEG(3,69,4) = 0
-    DEG(3,69,5) = 1
-    DEG(3,69,6) = 0
-    DEG(3,69,7) = 1
-    DEG(3,69,8) = 1
-    DEG(3,69,9) = 0
-    DEG(3,69,10) = 0
-    DEG(3,69,11) = 0
-    DEG(3,69,12) = 0
-  COEF(3,69) = (0.46358450176598026, 0)
-    DEG(3,70,1) = 0
-    DEG(3,70,2) = 0
-    DEG(3,70,3) = 1
-    DEG(3,70,4) = 0
-    DEG(3,70,5) = 1
-    DEG(3,70,6) = 0
-    DEG(3,70,7) = 1
-    DEG(3,70,8) = 1
-    DEG(3,70,9) = 0
-    DEG(3,70,10) = 0
-    DEG(3,70,11) = 0
-    DEG(3,70,12) = 0
-  COEF(3,70) = (0.8183358143712927, 0)
-    DEG(3,71,1) = 0
-    DEG(3,71,2) = 0
-    DEG(3,71,3) = 0
-    DEG(3,71,4) = 1
-    DEG(3,71,5) = 1
-    DEG(3,71,6) = 0
-    DEG(3,71,7) = 1
-    DEG(3,71,8) = 1
-    DEG(3,71,9) = 0
-    DEG(3,71,10) = 0
-    DEG(3,71,11) = 0
-    DEG(3,71,12) = 0
-  COEF(3,71) = (-0.7071409848678237, 0)
-    DEG(3,72,1) = 0
-    DEG(3,72,2) = 0
-    DEG(3,72,3) = 0
-    DEG(3,72,4) = 0
-    DEG(3,72,5) = 2
-    DEG(3,72,6) = 0
-    DEG(3,72,7) = 1
-    DEG(3,72,8) = 1
-    DEG(3,72,9) = 0
-    DEG(3,72,10) = 0
-    DEG(3,72,11) = 0
-    DEG(3,72,12) = 0
-  COEF(3,72) = (-0.23179225088299013, 0)
-    DEG(3,73,1) = 1
-    DEG(3,73,2) = 0
-    DEG(3,73,3) = 0
-    DEG(3,73,4) = 0
-    DEG(3,73,5) = 0
-    DEG(3,73,6) = 1
-    DEG(3,73,7) = 1
-    DEG(3,73,8) = 1
-    DEG(3,73,9) = 0
-    DEG(3,73,10) = 0
-    DEG(3,73,11) = 0
-    DEG(3,73,12) = 0
-  COEF(3,73) = (2.7705122035898007, 0)
-    DEG(3,74,1) = 0
-    DEG(3,74,2) = 1
-    DEG(3,74,3) = 0
-    DEG(3,74,4) = 0
-    DEG(3,74,5) = 0
-    DEG(3,74,6) = 1
-    DEG(3,74,7) = 1
-    DEG(3,74,8) = 1
-    DEG(3,74,9) = 0
-    DEG(3,74,10) = 0
-    DEG(3,74,11) = 0
-    DEG(3,74,12) = 0
-  COEF(3,74) = (0.8183358143712927, 0)
-    DEG(3,75,1) = 0
-    DEG(3,75,2) = 0
-    DEG(3,75,3) = 1
-    DEG(3,75,4) = 0
-    DEG(3,75,5) = 0
-    DEG(3,75,6) = 1
-    DEG(3,75,7) = 1
-    DEG(3,75,8) = 1
-    DEG(3,75,9) = 0
-    DEG(3,75,10) = 0
-    DEG(3,75,11) = 0
-    DEG(3,75,12) = 0
-  COEF(3,75) = (-0.7143403574887737, 0)
-    DEG(3,76,1) = 0
-    DEG(3,76,2) = 0
-    DEG(3,76,3) = 0
-    DEG(3,76,4) = 1
-    DEG(3,76,5) = 0
-    DEG(3,76,6) = 1
-    DEG(3,76,7) = 1
-    DEG(3,76,8) = 1
-    DEG(3,76,9) = 0
-    DEG(3,76,10) = 0
-    DEG(3,76,11) = 0
-    DEG(3,76,12) = 0
-  COEF(3,76) = (-2.7705122035898007, 0)
-    DEG(3,77,1) = 0
-    DEG(3,77,2) = 0
-    DEG(3,77,3) = 0
-    DEG(3,77,4) = 0
-    DEG(3,77,5) = 1
-    DEG(3,77,6) = 1
-    DEG(3,77,7) = 1
-    DEG(3,77,8) = 1
-    DEG(3,77,9) = 0
-    DEG(3,77,10) = 0
-    DEG(3,77,11) = 0
-    DEG(3,77,12) = 0
-  COEF(3,77) = (-0.8183358143712927, 0)
-    DEG(3,78,1) = 0
-    DEG(3,78,2) = 0
-    DEG(3,78,3) = 0
-    DEG(3,78,4) = 0
-    DEG(3,78,5) = 0
-    DEG(3,78,6) = 2
-    DEG(3,78,7) = 1
-    DEG(3,78,8) = 1
-    DEG(3,78,9) = 0
-    DEG(3,78,10) = 0
-    DEG(3,78,11) = 0
-    DEG(3,78,12) = 0
-  COEF(3,78) = (0.35717017874438683, 0)
-    DEG(3,79,1) = 1
-    DEG(3,79,2) = 0
-    DEG(3,79,3) = 0
-    DEG(3,79,4) = 1
-    DEG(3,79,5) = 0
-    DEG(3,79,6) = 0
-    DEG(3,79,7) = 0
-    DEG(3,79,8) = 2
-    DEG(3,79,9) = 0
-    DEG(3,79,10) = 0
-    DEG(3,79,11) = 0
-    DEG(3,79,12) = 0
-  COEF(3,79) = (0.0357317376785225, 0)
-    DEG(3,80,1) = 0
-    DEG(3,80,2) = 1
-    DEG(3,80,3) = 0
-    DEG(3,80,4) = 1
-    DEG(3,80,5) = 0
-    DEG(3,80,6) = 0
-    DEG(3,80,7) = 0
-    DEG(3,80,8) = 2
-    DEG(3,80,9) = 0
-    DEG(3,80,10) = 0
-    DEG(3,80,11) = 0
-    DEG(3,80,12) = 0
-  COEF(3,80) = (0.018957077338460304, 0)
-    DEG(3,81,1) = 0
-    DEG(3,81,2) = 0
-    DEG(3,81,3) = 1
-    DEG(3,81,4) = 1
-    DEG(3,81,5) = 0
-    DEG(3,81,6) = 0
-    DEG(3,81,7) = 0
-    DEG(3,81,8) = 2
-    DEG(3,81,9) = 0
-    DEG(3,81,10) = 0
-    DEG(3,81,11) = 0
-    DEG(3,81,12) = 0
-  COEF(3,81) = (0.42073652920977717, 0)
-    DEG(3,82,1) = 0
-    DEG(3,82,2) = 0
-    DEG(3,82,3) = 0
-    DEG(3,82,4) = 2
-    DEG(3,82,5) = 0
-    DEG(3,82,6) = 0
-    DEG(3,82,7) = 0
-    DEG(3,82,8) = 2
-    DEG(3,82,9) = 0
-    DEG(3,82,10) = 0
-    DEG(3,82,11) = 0
-    DEG(3,82,12) = 0
-  COEF(3,82) = (-0.01786586883926125, 0)
-    DEG(3,83,1) = 1
-    DEG(3,83,2) = 0
-    DEG(3,83,3) = 0
-    DEG(3,83,4) = 0
-    DEG(3,83,5) = 1
-    DEG(3,83,6) = 0
-    DEG(3,83,7) = 0
-    DEG(3,83,8) = 2
-    DEG(3,83,9) = 0
-    DEG(3,83,10) = 0
-    DEG(3,83,11) = 0
-    DEG(3,83,12) = 0
-  COEF(3,83) = (0.018957077338460304, 0)
-    DEG(3,84,1) = 0
-    DEG(3,84,2) = 1
-    DEG(3,84,3) = 0
-    DEG(3,84,4) = 0
-    DEG(3,84,5) = 1
-    DEG(3,84,6) = 0
-    DEG(3,84,7) = 0
-    DEG(3,84,8) = 2
-    DEG(3,84,9) = 0
-    DEG(3,84,10) = 0
-    DEG(3,84,11) = 0
-    DEG(3,84,12) = 0
-  COEF(3,84) = (-0.8636306353576336, 0)
-    DEG(3,85,1) = 0
-    DEG(3,85,2) = 0
-    DEG(3,85,3) = 1
-    DEG(3,85,4) = 0
-    DEG(3,85,5) = 1
-    DEG(3,85,6) = 0
-    DEG(3,85,7) = 0
-    DEG(3,85,8) = 2
-    DEG(3,85,9) = 0
-    DEG(3,85,10) = 0
-    DEG(3,85,11) = 0
-    DEG(3,85,12) = 0
-  COEF(3,85) = (-1.6754740536365504, 0)
-    DEG(3,86,1) = 0
-    DEG(3,86,2) = 0
-    DEG(3,86,3) = 0
-    DEG(3,86,4) = 1
-    DEG(3,86,5) = 1
-    DEG(3,86,6) = 0
-    DEG(3,86,7) = 0
-    DEG(3,86,8) = 2
-    DEG(3,86,9) = 0
-    DEG(3,86,10) = 0
-    DEG(3,86,11) = 0
-    DEG(3,86,12) = 0
-  COEF(3,86) = (-0.018957077338460304, 0)
-    DEG(3,87,1) = 0
-    DEG(3,87,2) = 0
-    DEG(3,87,3) = 0
-    DEG(3,87,4) = 0
-    DEG(3,87,5) = 2
-    DEG(3,87,6) = 0
-    DEG(3,87,7) = 0
-    DEG(3,87,8) = 2
-    DEG(3,87,9) = 0
-    DEG(3,87,10) = 0
-    DEG(3,87,11) = 0
-    DEG(3,87,12) = 0
-  COEF(3,87) = (0.4318153176788168, 0)
-    DEG(3,88,1) = 1
-    DEG(3,88,2) = 0
-    DEG(3,88,3) = 0
-    DEG(3,88,4) = 0
-    DEG(3,88,5) = 0
-    DEG(3,88,6) = 1
-    DEG(3,88,7) = 0
-    DEG(3,88,8) = 2
-    DEG(3,88,9) = 0
-    DEG(3,88,10) = 0
-    DEG(3,88,11) = 0
-    DEG(3,88,12) = 0
-  COEF(3,88) = (0.42073652920977717, 0)
-    DEG(3,89,1) = 0
-    DEG(3,89,2) = 1
-    DEG(3,89,3) = 0
-    DEG(3,89,4) = 0
-    DEG(3,89,5) = 0
-    DEG(3,89,6) = 1
-    DEG(3,89,7) = 0
-    DEG(3,89,8) = 2
-    DEG(3,89,9) = 0
-    DEG(3,89,10) = 0
-    DEG(3,89,11) = 0
-    DEG(3,89,12) = 0
-  COEF(3,89) = (-1.6754740536365504, 0)
-    DEG(3,90,1) = 0
-    DEG(3,90,2) = 0
-    DEG(3,90,3) = 1
-    DEG(3,90,4) = 0
-    DEG(3,90,5) = 0
-    DEG(3,90,6) = 1
-    DEG(3,90,7) = 0
-    DEG(3,90,8) = 2
-    DEG(3,90,9) = 0
-    DEG(3,90,10) = 0
-    DEG(3,90,11) = 0
-    DEG(3,90,12) = 0
-  COEF(3,90) = (0.8278988976791111, 0)
-    DEG(3,91,1) = 0
-    DEG(3,91,2) = 0
-    DEG(3,91,3) = 0
-    DEG(3,91,4) = 1
-    DEG(3,91,5) = 0
-    DEG(3,91,6) = 1
-    DEG(3,91,7) = 0
-    DEG(3,91,8) = 2
-    DEG(3,91,9) = 0
-    DEG(3,91,10) = 0
-    DEG(3,91,11) = 0
-    DEG(3,91,12) = 0
-  COEF(3,91) = (-0.42073652920977717, 0)
-    DEG(3,92,1) = 0
-    DEG(3,92,2) = 0
-    DEG(3,92,3) = 0
-    DEG(3,92,4) = 0
-    DEG(3,92,5) = 1
-    DEG(3,92,6) = 1
-    DEG(3,92,7) = 0
-    DEG(3,92,8) = 2
-    DEG(3,92,9) = 0
-    DEG(3,92,10) = 0
-    DEG(3,92,11) = 0
-    DEG(3,92,12) = 0
-  COEF(3,92) = (1.6754740536365504, 0)
-    DEG(3,93,1) = 0
-    DEG(3,93,2) = 0
-    DEG(3,93,3) = 0
-    DEG(3,93,4) = 0
-    DEG(3,93,5) = 0
-    DEG(3,93,6) = 2
-    DEG(3,93,7) = 0
-    DEG(3,93,8) = 2
-    DEG(3,93,9) = 0
-    DEG(3,93,10) = 0
-    DEG(3,93,11) = 0
-    DEG(3,93,12) = 0
-  COEF(3,93) = (-0.41394944883955553, 0)
-    DEG(3,94,1) = 0
-    DEG(3,94,2) = 0
-    DEG(3,94,3) = 0
-    DEG(3,94,4) = 0
-    DEG(3,94,5) = 0
-    DEG(3,94,6) = 0
-    DEG(3,94,7) = 0
-    DEG(3,94,8) = 0
-    DEG(3,94,9) = 1
-    DEG(3,94,10) = 0
-    DEG(3,94,11) = 0
-    DEG(3,94,12) = 0
-  COEF(3,94) = (-2.4422224089728672, 0)
-    DEG(3,95,1) = 1
-    DEG(3,95,2) = 0
-    DEG(3,95,3) = 0
-    DEG(3,95,4) = 1
-    DEG(3,95,5) = 0
-    DEG(3,95,6) = 0
-    DEG(3,95,7) = 0
-    DEG(3,95,8) = 0
-    DEG(3,95,9) = 1
-    DEG(3,95,10) = 0
-    DEG(3,95,11) = 0
-    DEG(3,95,12) = 0
-  COEF(3,95) = (2.4236661585315633, 0)
-    DEG(3,96,1) = 0
-    DEG(3,96,2) = 1
-    DEG(3,96,3) = 0
-    DEG(3,96,4) = 1
-    DEG(3,96,5) = 0
-    DEG(3,96,6) = 0
-    DEG(3,96,7) = 0
-    DEG(3,96,8) = 0
-    DEG(3,96,9) = 1
-    DEG(3,96,10) = 0
-    DEG(3,96,11) = 0
-    DEG(3,96,12) = 0
-  COEF(3,96) = (-2.919943572089655, 0)
-    DEG(3,97,1) = 0
-    DEG(3,97,2) = 0
-    DEG(3,97,3) = 1
-    DEG(3,97,4) = 1
-    DEG(3,97,5) = 0
-    DEG(3,97,6) = 0
-    DEG(3,97,7) = 0
-    DEG(3,97,8) = 0
-    DEG(3,97,9) = 1
-    DEG(3,97,10) = 0
-    DEG(3,97,11) = 0
-    DEG(3,97,12) = 0
-  COEF(3,97) = (-0.43067091203449875, 0)
-    DEG(3,98,1) = 0
-    DEG(3,98,2) = 0
-    DEG(3,98,3) = 0
-    DEG(3,98,4) = 2
-    DEG(3,98,5) = 0
-    DEG(3,98,6) = 0
-    DEG(3,98,7) = 0
-    DEG(3,98,8) = 0
-    DEG(3,98,9) = 1
-    DEG(3,98,10) = 0
-    DEG(3,98,11) = 0
-    DEG(3,98,12) = 0
-  COEF(3,98) = (-1.2118330792657817, 0)
-    DEG(3,99,1) = 1
-    DEG(3,99,2) = 0
-    DEG(3,99,3) = 0
-    DEG(3,99,4) = 0
-    DEG(3,99,5) = 1
-    DEG(3,99,6) = 0
-    DEG(3,99,7) = 0
-    DEG(3,99,8) = 0
-    DEG(3,99,9) = 1
-    DEG(3,99,10) = 0
-    DEG(3,99,11) = 0
-    DEG(3,99,12) = 0
-  COEF(3,99) = (-2.919943572089655, 0)
-    DEG(3,100,1) = 0
-    DEG(3,100,2) = 1
-    DEG(3,100,3) = 0
-    DEG(3,100,4) = 0
-    DEG(3,100,5) = 1
-    DEG(3,100,6) = 0
-    DEG(3,100,7) = 0
-    DEG(3,100,8) = 0
-    DEG(3,100,9) = 1
-    DEG(3,100,10) = 0
-    DEG(3,100,11) = 0
-    DEG(3,100,12) = 0
-  COEF(3,100) = (2.1277409176991364, 0)
-    DEG(3,101,1) = 0
-    DEG(3,101,2) = 0
-    DEG(3,101,3) = 1
-    DEG(3,101,4) = 0
-    DEG(3,101,5) = 1
-    DEG(3,101,6) = 0
-    DEG(3,101,7) = 0
-    DEG(3,101,8) = 0
-    DEG(3,101,9) = 1
-    DEG(3,101,10) = 0
-    DEG(3,101,11) = 0
-    DEG(3,101,12) = 0
-  COEF(3,101) = (-1.1914447075061463, 0)
-    DEG(3,102,1) = 0
-    DEG(3,102,2) = 0
-    DEG(3,102,3) = 0
-    DEG(3,102,4) = 1
-    DEG(3,102,5) = 1
-    DEG(3,102,6) = 0
-    DEG(3,102,7) = 0
-    DEG(3,102,8) = 0
-    DEG(3,102,9) = 1
-    DEG(3,102,10) = 0
-    DEG(3,102,11) = 0
-    DEG(3,102,12) = 0
-  COEF(3,102) = (2.919943572089655, 0)
-    DEG(3,103,1) = 0
-    DEG(3,103,2) = 0
-    DEG(3,103,3) = 0
-    DEG(3,103,4) = 0
-    DEG(3,103,5) = 2
-    DEG(3,103,6) = 0
-    DEG(3,103,7) = 0
-    DEG(3,103,8) = 0
-    DEG(3,103,9) = 1
-    DEG(3,103,10) = 0
-    DEG(3,103,11) = 0
-    DEG(3,103,12) = 0
-  COEF(3,103) = (-1.0638704588495682, 0)
-    DEG(3,104,1) = 1
-    DEG(3,104,2) = 0
-    DEG(3,104,3) = 0
-    DEG(3,104,4) = 0
-    DEG(3,104,5) = 0
-    DEG(3,104,6) = 1
-    DEG(3,104,7) = 0
-    DEG(3,104,8) = 0
-    DEG(3,104,9) = 1
-    DEG(3,104,10) = 0
-    DEG(3,104,11) = 0
-    DEG(3,104,12) = 0
-  COEF(3,104) = (-0.43067091203449875, 0)
-    DEG(3,105,1) = 0
-    DEG(3,105,2) = 1
-    DEG(3,105,3) = 0
-    DEG(3,105,4) = 0
-    DEG(3,105,5) = 0
-    DEG(3,105,6) = 1
-    DEG(3,105,7) = 0
-    DEG(3,105,8) = 0
-    DEG(3,105,9) = 1
-    DEG(3,105,10) = 0
-    DEG(3,105,11) = 0
-    DEG(3,105,12) = 0
-  COEF(3,105) = (-1.1914447075061463, 0)
-    DEG(3,106,1) = 0
-    DEG(3,106,2) = 0
-    DEG(3,106,3) = 1
-    DEG(3,106,4) = 0
-    DEG(3,106,5) = 0
-    DEG(3,106,6) = 1
-    DEG(3,106,7) = 0
-    DEG(3,106,8) = 0
-    DEG(3,106,9) = 1
-    DEG(3,106,10) = 0
-    DEG(3,106,11) = 0
-    DEG(3,106,12) = 0
-  COEF(3,106) = (0.33303774171503486, 0)
-    DEG(3,107,1) = 0
-    DEG(3,107,2) = 0
-    DEG(3,107,3) = 0
-    DEG(3,107,4) = 1
-    DEG(3,107,5) = 0
-    DEG(3,107,6) = 1
-    DEG(3,107,7) = 0
-    DEG(3,107,8) = 0
-    DEG(3,107,9) = 1
-    DEG(3,107,10) = 0
-    DEG(3,107,11) = 0
-    DEG(3,107,12) = 0
-  COEF(3,107) = (0.43067091203449875, 0)
-    DEG(3,108,1) = 0
-    DEG(3,108,2) = 0
-    DEG(3,108,3) = 0
-    DEG(3,108,4) = 0
-    DEG(3,108,5) = 1
-    DEG(3,108,6) = 1
-    DEG(3,108,7) = 0
-    DEG(3,108,8) = 0
-    DEG(3,108,9) = 1
-    DEG(3,108,10) = 0
-    DEG(3,108,11) = 0
-    DEG(3,108,12) = 0
-  COEF(3,108) = (1.1914447075061463, 0)
-    DEG(3,109,1) = 0
-    DEG(3,109,2) = 0
-    DEG(3,109,3) = 0
-    DEG(3,109,4) = 0
-    DEG(3,109,5) = 0
-    DEG(3,109,6) = 2
-    DEG(3,109,7) = 0
-    DEG(3,109,8) = 0
-    DEG(3,109,9) = 1
-    DEG(3,109,10) = 0
-    DEG(3,109,11) = 0
-    DEG(3,109,12) = 0
-  COEF(3,109) = (-0.16651887085751743, 0)
-    DEG(3,110,1) = 1
-    DEG(3,110,2) = 0
-    DEG(3,110,3) = 0
-    DEG(3,110,4) = 1
-    DEG(3,110,5) = 0
-    DEG(3,110,6) = 0
-    DEG(3,110,7) = 1
-    DEG(3,110,8) = 0
-    DEG(3,110,9) = 1
-    DEG(3,110,10) = 0
-    DEG(3,110,11) = 0
-    DEG(3,110,12) = 0
-  COEF(3,110) = (3.3206786711972587, 0)
-    DEG(3,111,1) = 0
-    DEG(3,111,2) = 1
-    DEG(3,111,3) = 0
-    DEG(3,111,4) = 1
-    DEG(3,111,5) = 0
-    DEG(3,111,6) = 0
-    DEG(3,111,7) = 1
-    DEG(3,111,8) = 0
-    DEG(3,111,9) = 1
-    DEG(3,111,10) = 0
-    DEG(3,111,11) = 0
-    DEG(3,111,12) = 0
-  COEF(3,111) = (-1.4433036793115037, 0)
-    DEG(3,112,1) = 0
-    DEG(3,112,2) = 0
-    DEG(3,112,3) = 1
-    DEG(3,112,4) = 1
-    DEG(3,112,5) = 0
-    DEG(3,112,6) = 0
-    DEG(3,112,7) = 1
-    DEG(3,112,8) = 0
-    DEG(3,112,9) = 1
-    DEG(3,112,10) = 0
-    DEG(3,112,11) = 0
-    DEG(3,112,12) = 0
-  COEF(3,112) = (0.13807939045612216, 0)
-    DEG(3,113,1) = 0
-    DEG(3,113,2) = 0
-    DEG(3,113,3) = 0
-    DEG(3,113,4) = 2
-    DEG(3,113,5) = 0
-    DEG(3,113,6) = 0
-    DEG(3,113,7) = 1
-    DEG(3,113,8) = 0
-    DEG(3,113,9) = 1
-    DEG(3,113,10) = 0
-    DEG(3,113,11) = 0
-    DEG(3,113,12) = 0
-  COEF(3,113) = (-1.6603393355986293, 0)
-    DEG(3,114,1) = 1
-    DEG(3,114,2) = 0
-    DEG(3,114,3) = 0
-    DEG(3,114,4) = 0
-    DEG(3,114,5) = 1
-    DEG(3,114,6) = 0
-    DEG(3,114,7) = 1
-    DEG(3,114,8) = 0
-    DEG(3,114,9) = 1
-    DEG(3,114,10) = 0
-    DEG(3,114,11) = 0
-    DEG(3,114,12) = 0
-  COEF(3,114) = (-1.4433036793115037, 0)
-    DEG(3,115,1) = 0
-    DEG(3,115,2) = 1
-    DEG(3,115,3) = 0
-    DEG(3,115,4) = 0
-    DEG(3,115,5) = 1
-    DEG(3,115,6) = 0
-    DEG(3,115,7) = 1
-    DEG(3,115,8) = 0
-    DEG(3,115,9) = 1
-    DEG(3,115,10) = 0
-    DEG(3,115,11) = 0
-    DEG(3,115,12) = 0
-  COEF(3,115) = (-2.315289661119178, 0)
-    DEG(3,116,1) = 0
-    DEG(3,116,2) = 0
-    DEG(3,116,3) = 1
-    DEG(3,116,4) = 0
-    DEG(3,116,5) = 1
-    DEG(3,116,6) = 0
-    DEG(3,116,7) = 1
-    DEG(3,116,8) = 0
-    DEG(3,116,9) = 1
-    DEG(3,116,10) = 0
-    DEG(3,116,11) = 0
-    DEG(3,116,12) = 0
-  COEF(3,116) = (0.4266457301353015, 0)
-    DEG(3,117,1) = 0
-    DEG(3,117,2) = 0
-    DEG(3,117,3) = 0
-    DEG(3,117,4) = 1
-    DEG(3,117,5) = 1
-    DEG(3,117,6) = 0
-    DEG(3,117,7) = 1
-    DEG(3,117,8) = 0
-    DEG(3,117,9) = 1
-    DEG(3,117,10) = 0
-    DEG(3,117,11) = 0
-    DEG(3,117,12) = 0
-  COEF(3,117) = (1.4433036793115037, 0)
-    DEG(3,118,1) = 0
-    DEG(3,118,2) = 0
-    DEG(3,118,3) = 0
-    DEG(3,118,4) = 0
-    DEG(3,118,5) = 2
-    DEG(3,118,6) = 0
-    DEG(3,118,7) = 1
-    DEG(3,118,8) = 0
-    DEG(3,118,9) = 1
-    DEG(3,118,10) = 0
-    DEG(3,118,11) = 0
-    DEG(3,118,12) = 0
-  COEF(3,118) = (1.157644830559589, 0)
-    DEG(3,119,1) = 1
-    DEG(3,119,2) = 0
-    DEG(3,119,3) = 0
-    DEG(3,119,4) = 0
-    DEG(3,119,5) = 0
-    DEG(3,119,6) = 1
-    DEG(3,119,7) = 1
-    DEG(3,119,8) = 0
-    DEG(3,119,9) = 1
-    DEG(3,119,10) = 0
-    DEG(3,119,11) = 0
-    DEG(3,119,12) = 0
-  COEF(3,119) = (0.13807939045612216, 0)
-    DEG(3,120,1) = 0
-    DEG(3,120,2) = 1
-    DEG(3,120,3) = 0
-    DEG(3,120,4) = 0
-    DEG(3,120,5) = 0
-    DEG(3,120,6) = 1
-    DEG(3,120,7) = 1
-    DEG(3,120,8) = 0
-    DEG(3,120,9) = 1
-    DEG(3,120,10) = 0
-    DEG(3,120,11) = 0
-    DEG(3,120,12) = 0
-  COEF(3,120) = (0.4266457301353015, 0)
-    DEG(3,121,1) = 0
-    DEG(3,121,2) = 0
-    DEG(3,121,3) = 1
-    DEG(3,121,4) = 0
-    DEG(3,121,5) = 0
-    DEG(3,121,6) = 1
-    DEG(3,121,7) = 1
-    DEG(3,121,8) = 0
-    DEG(3,121,9) = 1
-    DEG(3,121,10) = 0
-    DEG(3,121,11) = 0
-    DEG(3,121,12) = 0
-  COEF(3,121) = (-1.0053890100780807, 0)
-    DEG(3,122,1) = 0
-    DEG(3,122,2) = 0
-    DEG(3,122,3) = 0
-    DEG(3,122,4) = 1
-    DEG(3,122,5) = 0
-    DEG(3,122,6) = 1
-    DEG(3,122,7) = 1
-    DEG(3,122,8) = 0
-    DEG(3,122,9) = 1
-    DEG(3,122,10) = 0
-    DEG(3,122,11) = 0
-    DEG(3,122,12) = 0
-  COEF(3,122) = (-0.13807939045612216, 0)
-    DEG(3,123,1) = 0
-    DEG(3,123,2) = 0
-    DEG(3,123,3) = 0
-    DEG(3,123,4) = 0
-    DEG(3,123,5) = 1
-    DEG(3,123,6) = 1
-    DEG(3,123,7) = 1
-    DEG(3,123,8) = 0
-    DEG(3,123,9) = 1
-    DEG(3,123,10) = 0
-    DEG(3,123,11) = 0
-    DEG(3,123,12) = 0
-  COEF(3,123) = (-0.4266457301353015, 0)
-    DEG(3,124,1) = 0
-    DEG(3,124,2) = 0
-    DEG(3,124,3) = 0
-    DEG(3,124,4) = 0
-    DEG(3,124,5) = 0
-    DEG(3,124,6) = 2
-    DEG(3,124,7) = 1
-    DEG(3,124,8) = 0
-    DEG(3,124,9) = 1
-    DEG(3,124,10) = 0
-    DEG(3,124,11) = 0
-    DEG(3,124,12) = 0
-  COEF(3,124) = (0.5026945050390403, 0)
-    DEG(3,125,1) = 1
-    DEG(3,125,2) = 0
-    DEG(3,125,3) = 0
-    DEG(3,125,4) = 1
-    DEG(3,125,5) = 0
-    DEG(3,125,6) = 0
-    DEG(3,125,7) = 0
-    DEG(3,125,8) = 1
-    DEG(3,125,9) = 1
-    DEG(3,125,10) = 0
-    DEG(3,125,11) = 0
-    DEG(3,125,12) = 0
-  COEF(3,125) = (0.48953509933995654, 0)
-    DEG(3,126,1) = 0
-    DEG(3,126,2) = 1
-    DEG(3,126,3) = 0
-    DEG(3,126,4) = 1
-    DEG(3,126,5) = 0
-    DEG(3,126,6) = 0
-    DEG(3,126,7) = 0
-    DEG(3,126,8) = 1
-    DEG(3,126,9) = 1
-    DEG(3,126,10) = 0
-    DEG(3,126,11) = 0
-    DEG(3,126,12) = 0
-  COEF(3,126) = (-1.480444110953203, 0)
-    DEG(3,127,1) = 0
-    DEG(3,127,2) = 0
-    DEG(3,127,3) = 1
-    DEG(3,127,4) = 1
-    DEG(3,127,5) = 0
-    DEG(3,127,6) = 0
-    DEG(3,127,7) = 0
-    DEG(3,127,8) = 1
-    DEG(3,127,9) = 1
-    DEG(3,127,10) = 0
-    DEG(3,127,11) = 0
-    DEG(3,127,12) = 0
-  COEF(3,127) = (0.15578450291198861, 0)
-    DEG(3,128,1) = 0
-    DEG(3,128,2) = 0
-    DEG(3,128,3) = 0
-    DEG(3,128,4) = 2
-    DEG(3,128,5) = 0
-    DEG(3,128,6) = 0
-    DEG(3,128,7) = 0
-    DEG(3,128,8) = 1
-    DEG(3,128,9) = 1
-    DEG(3,128,10) = 0
-    DEG(3,128,11) = 0
-    DEG(3,128,12) = 0
-  COEF(3,128) = (-0.24476754966997827, 0)
-    DEG(3,129,1) = 1
-    DEG(3,129,2) = 0
-    DEG(3,129,3) = 0
-    DEG(3,129,4) = 0
-    DEG(3,129,5) = 1
-    DEG(3,129,6) = 0
-    DEG(3,129,7) = 0
-    DEG(3,129,8) = 1
-    DEG(3,129,9) = 1
-    DEG(3,129,10) = 0
-    DEG(3,129,11) = 0
-    DEG(3,129,12) = 0
-  COEF(3,129) = (-1.480444110953203, 0)
-    DEG(3,130,1) = 0
-    DEG(3,130,2) = 1
-    DEG(3,130,3) = 0
-    DEG(3,130,4) = 0
-    DEG(3,130,5) = 1
-    DEG(3,130,6) = 0
-    DEG(3,130,7) = 0
-    DEG(3,130,8) = 1
-    DEG(3,130,9) = 1
-    DEG(3,130,10) = 0
-    DEG(3,130,11) = 0
-    DEG(3,130,12) = 0
-  COEF(3,130) = (2.7880795150659696, 0)
-    DEG(3,131,1) = 0
-    DEG(3,131,2) = 0
-    DEG(3,131,3) = 1
-    DEG(3,131,4) = 0
-    DEG(3,131,5) = 1
-    DEG(3,131,6) = 0
-    DEG(3,131,7) = 0
-    DEG(3,131,8) = 1
-    DEG(3,131,9) = 1
-    DEG(3,131,10) = 0
-    DEG(3,131,11) = 0
-    DEG(3,131,12) = 0
-  COEF(3,131) = (-1.5036315740189081, 0)
-    DEG(3,132,1) = 0
-    DEG(3,132,2) = 0
-    DEG(3,132,3) = 0
-    DEG(3,132,4) = 1
-    DEG(3,132,5) = 1
-    DEG(3,132,6) = 0
-    DEG(3,132,7) = 0
-    DEG(3,132,8) = 1
-    DEG(3,132,9) = 1
-    DEG(3,132,10) = 0
-    DEG(3,132,11) = 0
-    DEG(3,132,12) = 0
-  COEF(3,132) = (1.480444110953203, 0)
-    DEG(3,133,1) = 0
-    DEG(3,133,2) = 0
-    DEG(3,133,3) = 0
-    DEG(3,133,4) = 0
-    DEG(3,133,5) = 2
-    DEG(3,133,6) = 0
-    DEG(3,133,7) = 0
-    DEG(3,133,8) = 1
-    DEG(3,133,9) = 1
-    DEG(3,133,10) = 0
-    DEG(3,133,11) = 0
-    DEG(3,133,12) = 0
-  COEF(3,133) = (-1.3940397575329848, 0)
-    DEG(3,134,1) = 1
-    DEG(3,134,2) = 0
-    DEG(3,134,3) = 0
-    DEG(3,134,4) = 0
-    DEG(3,134,5) = 0
-    DEG(3,134,6) = 1
-    DEG(3,134,7) = 0
-    DEG(3,134,8) = 1
-    DEG(3,134,9) = 1
-    DEG(3,134,10) = 0
-    DEG(3,134,11) = 0
-    DEG(3,134,12) = 0
-  COEF(3,134) = (0.15578450291198861, 0)
-    DEG(3,135,1) = 0
-    DEG(3,135,2) = 1
-    DEG(3,135,3) = 0
-    DEG(3,135,4) = 0
-    DEG(3,135,5) = 0
-    DEG(3,135,6) = 1
-    DEG(3,135,7) = 0
-    DEG(3,135,8) = 1
-    DEG(3,135,9) = 1
-    DEG(3,135,10) = 0
-    DEG(3,135,11) = 0
-    DEG(3,135,12) = 0
-  COEF(3,135) = (-1.5036315740189081, 0)
-    DEG(3,136,1) = 0
-    DEG(3,136,2) = 0
-    DEG(3,136,3) = 1
-    DEG(3,136,4) = 0
-    DEG(3,136,5) = 0
-    DEG(3,136,6) = 1
-    DEG(3,136,7) = 0
-    DEG(3,136,8) = 1
-    DEG(3,136,9) = 1
-    DEG(3,136,10) = 0
-    DEG(3,136,11) = 0
-    DEG(3,136,12) = 0
-  COEF(3,136) = (-3.277614614405926, 0)
-    DEG(3,137,1) = 0
-    DEG(3,137,2) = 0
-    DEG(3,137,3) = 0
-    DEG(3,137,4) = 1
-    DEG(3,137,5) = 0
-    DEG(3,137,6) = 1
-    DEG(3,137,7) = 0
-    DEG(3,137,8) = 1
-    DEG(3,137,9) = 1
-    DEG(3,137,10) = 0
-    DEG(3,137,11) = 0
-    DEG(3,137,12) = 0
-  COEF(3,137) = (-0.15578450291198861, 0)
-    DEG(3,138,1) = 0
-    DEG(3,138,2) = 0
-    DEG(3,138,3) = 0
-    DEG(3,138,4) = 0
-    DEG(3,138,5) = 1
-    DEG(3,138,6) = 1
-    DEG(3,138,7) = 0
-    DEG(3,138,8) = 1
-    DEG(3,138,9) = 1
-    DEG(3,138,10) = 0
-    DEG(3,138,11) = 0
-    DEG(3,138,12) = 0
-  COEF(3,138) = (1.5036315740189081, 0)
-    DEG(3,139,1) = 0
-    DEG(3,139,2) = 0
-    DEG(3,139,3) = 0
-    DEG(3,139,4) = 0
-    DEG(3,139,5) = 0
-    DEG(3,139,6) = 2
-    DEG(3,139,7) = 0
-    DEG(3,139,8) = 1
-    DEG(3,139,9) = 1
-    DEG(3,139,10) = 0
-    DEG(3,139,11) = 0
-    DEG(3,139,12) = 0
-  COEF(3,139) = (1.638807307202963, 0)
-    DEG(3,140,1) = 1
-    DEG(3,140,2) = 0
-    DEG(3,140,3) = 0
-    DEG(3,140,4) = 1
-    DEG(3,140,5) = 0
-    DEG(3,140,6) = 0
-    DEG(3,140,7) = 0
-    DEG(3,140,8) = 0
-    DEG(3,140,9) = 2
-    DEG(3,140,10) = 0
-    DEG(3,140,11) = 0
-    DEG(3,140,12) = 0
-  COEF(3,140) = (-0.11767074715475977, 0)
-    DEG(3,141,1) = 0
-    DEG(3,141,2) = 1
-    DEG(3,141,3) = 0
-    DEG(3,141,4) = 1
-    DEG(3,141,5) = 0
-    DEG(3,141,6) = 0
-    DEG(3,141,7) = 0
-    DEG(3,141,8) = 0
-    DEG(3,141,9) = 2
-    DEG(3,141,10) = 0
-    DEG(3,141,11) = 0
-    DEG(3,141,12) = 0
-  COEF(3,141) = (-0.18369037411771155, 0)
-    DEG(3,142,1) = 0
-    DEG(3,142,2) = 0
-    DEG(3,142,3) = 1
-    DEG(3,142,4) = 1
-    DEG(3,142,5) = 0
-    DEG(3,142,6) = 0
-    DEG(3,142,7) = 0
-    DEG(3,142,8) = 0
-    DEG(3,142,9) = 2
-    DEG(3,142,10) = 0
-    DEG(3,142,11) = 0
-    DEG(3,142,12) = 0
-  COEF(3,142) = (-1.0758531168661296, 0)
-    DEG(3,143,1) = 0
-    DEG(3,143,2) = 0
-    DEG(3,143,3) = 0
-    DEG(3,143,4) = 2
-    DEG(3,143,5) = 0
-    DEG(3,143,6) = 0
-    DEG(3,143,7) = 0
-    DEG(3,143,8) = 0
-    DEG(3,143,9) = 2
-    DEG(3,143,10) = 0
-    DEG(3,143,11) = 0
-    DEG(3,143,12) = 0
-  COEF(3,143) = (0.05883537357737988, 0)
-    DEG(3,144,1) = 1
-    DEG(3,144,2) = 0
-    DEG(3,144,3) = 0
-    DEG(3,144,4) = 0
-    DEG(3,144,5) = 1
-    DEG(3,144,6) = 0
-    DEG(3,144,7) = 0
-    DEG(3,144,8) = 0
-    DEG(3,144,9) = 2
-    DEG(3,144,10) = 0
-    DEG(3,144,11) = 0
-    DEG(3,144,12) = 0
-  COEF(3,144) = (-0.18369037411771155, 0)
-    DEG(3,145,1) = 0
-    DEG(3,145,2) = 1
-    DEG(3,145,3) = 0
-    DEG(3,145,4) = 0
-    DEG(3,145,5) = 1
-    DEG(3,145,6) = 0
-    DEG(3,145,7) = 0
-    DEG(3,145,8) = 0
-    DEG(3,145,9) = 2
-    DEG(3,145,10) = 0
-    DEG(3,145,11) = 0
-    DEG(3,145,12) = 0
-  COEF(3,145) = (0.7191059803256388, 0)
-    DEG(3,146,1) = 0
-    DEG(3,146,2) = 0
-    DEG(3,146,3) = 1
-    DEG(3,146,4) = 0
-    DEG(3,146,5) = 1
-    DEG(3,146,6) = 0
-    DEG(3,146,7) = 0
-    DEG(3,146,8) = 0
-    DEG(3,146,9) = 2
-    DEG(3,146,10) = 0
-    DEG(3,146,11) = 0
-    DEG(3,146,12) = 0
-  COEF(3,146) = (1.3683343434170139, 0)
-    DEG(3,147,1) = 0
-    DEG(3,147,2) = 0
-    DEG(3,147,3) = 0
-    DEG(3,147,4) = 1
-    DEG(3,147,5) = 1
-    DEG(3,147,6) = 0
-    DEG(3,147,7) = 0
-    DEG(3,147,8) = 0
-    DEG(3,147,9) = 2
-    DEG(3,147,10) = 0
-    DEG(3,147,11) = 0
-    DEG(3,147,12) = 0
-  COEF(3,147) = (0.18369037411771155, 0)
-    DEG(3,148,1) = 0
-    DEG(3,148,2) = 0
-    DEG(3,148,3) = 0
-    DEG(3,148,4) = 0
-    DEG(3,148,5) = 2
-    DEG(3,148,6) = 0
-    DEG(3,148,7) = 0
-    DEG(3,148,8) = 0
-    DEG(3,148,9) = 2
-    DEG(3,148,10) = 0
-    DEG(3,148,11) = 0
-    DEG(3,148,12) = 0
-  COEF(3,148) = (-0.3595529901628194, 0)
-    DEG(3,149,1) = 1
-    DEG(3,149,2) = 0
-    DEG(3,149,3) = 0
-    DEG(3,149,4) = 0
-    DEG(3,149,5) = 0
-    DEG(3,149,6) = 1
-    DEG(3,149,7) = 0
-    DEG(3,149,8) = 0
-    DEG(3,149,9) = 2
-    DEG(3,149,10) = 0
-    DEG(3,149,11) = 0
-    DEG(3,149,12) = 0
-  COEF(3,149) = (-1.0758531168661296, 0)
-    DEG(3,150,1) = 0
-    DEG(3,150,2) = 1
-    DEG(3,150,3) = 0
-    DEG(3,150,4) = 0
-    DEG(3,150,5) = 0
-    DEG(3,150,6) = 1
-    DEG(3,150,7) = 0
-    DEG(3,150,8) = 0
-    DEG(3,150,9) = 2
-    DEG(3,150,10) = 0
-    DEG(3,150,11) = 0
-    DEG(3,150,12) = 0
-  COEF(3,150) = (1.3683343434170139, 0)
-    DEG(3,151,1) = 0
-    DEG(3,151,2) = 0
-    DEG(3,151,3) = 1
-    DEG(3,151,4) = 0
-    DEG(3,151,5) = 0
-    DEG(3,151,6) = 1
-    DEG(3,151,7) = 0
-    DEG(3,151,8) = 0
-    DEG(3,151,9) = 2
-    DEG(3,151,10) = 0
-    DEG(3,151,11) = 0
-    DEG(3,151,12) = 0
-  COEF(3,151) = (-0.601435233170879, 0)
-    DEG(3,152,1) = 0
-    DEG(3,152,2) = 0
-    DEG(3,152,3) = 0
-    DEG(3,152,4) = 1
-    DEG(3,152,5) = 0
-    DEG(3,152,6) = 1
-    DEG(3,152,7) = 0
-    DEG(3,152,8) = 0
-    DEG(3,152,9) = 2
-    DEG(3,152,10) = 0
-    DEG(3,152,11) = 0
-    DEG(3,152,12) = 0
-  COEF(3,152) = (1.0758531168661296, 0)
-    DEG(3,153,1) = 0
-    DEG(3,153,2) = 0
-    DEG(3,153,3) = 0
-    DEG(3,153,4) = 0
-    DEG(3,153,5) = 1
-    DEG(3,153,6) = 1
-    DEG(3,153,7) = 0
-    DEG(3,153,8) = 0
-    DEG(3,153,9) = 2
-    DEG(3,153,10) = 0
-    DEG(3,153,11) = 0
-    DEG(3,153,12) = 0
-  COEF(3,153) = (-1.3683343434170139, 0)
-    DEG(3,154,1) = 0
-    DEG(3,154,2) = 0
-    DEG(3,154,3) = 0
-    DEG(3,154,4) = 0
-    DEG(3,154,5) = 0
-    DEG(3,154,6) = 2
-    DEG(3,154,7) = 0
-    DEG(3,154,8) = 0
-    DEG(3,154,9) = 2
-    DEG(3,154,10) = 0
-    DEG(3,154,11) = 0
-    DEG(3,154,12) = 0
-  COEF(3,154) = (0.3007176165854395, 0)
-    DEG(3,155,1) = 0
-    DEG(3,155,2) = 0
-    DEG(3,155,3) = 0
-    DEG(3,155,4) = 0
-    DEG(3,155,5) = 0
-    DEG(3,155,6) = 0
-    DEG(3,155,7) = 0
-    DEG(3,155,8) = 0
-    DEG(3,155,9) = 0
-    DEG(3,155,10) = 1
-    DEG(3,155,11) = 0
-    DEG(3,155,12) = 0
-  COEF(3,155) = (-1.3541365871068656, 0)
-    DEG(3,156,1) = 1
-    DEG(3,156,2) = 0
-    DEG(3,156,3) = 0
-    DEG(3,156,4) = 1
-    DEG(3,156,5) = 0
-    DEG(3,156,6) = 0
-    DEG(3,156,7) = 0
-    DEG(3,156,8) = 0
-    DEG(3,156,9) = 0
-    DEG(3,156,10) = 1
-    DEG(3,156,11) = 0
-    DEG(3,156,12) = 0
-  COEF(3,156) = (1.3541365871068656, 0)
-    DEG(3,157,1) = 1
-    DEG(3,157,2) = 0
-    DEG(3,157,3) = 0
-    DEG(3,157,4) = 0
-    DEG(3,157,5) = 1
-    DEG(3,157,6) = 0
-    DEG(3,157,7) = 0
-    DEG(3,157,8) = 0
-    DEG(3,157,9) = 0
-    DEG(3,157,10) = 1
-    DEG(3,157,11) = 0
-    DEG(3,157,12) = 0
-  COEF(3,157) = (1.8603024879203394, 0)
-    DEG(3,158,1) = 1
-    DEG(3,158,2) = 0
-    DEG(3,158,3) = 0
-    DEG(3,158,4) = 0
-    DEG(3,158,5) = 0
-    DEG(3,158,6) = 1
-    DEG(3,158,7) = 0
-    DEG(3,158,8) = 0
-    DEG(3,158,9) = 0
-    DEG(3,158,10) = 1
-    DEG(3,158,11) = 0
-    DEG(3,158,12) = 0
-  COEF(3,158) = (-0.32643980823868707, 0)
-    DEG(3,159,1) = 0
-    DEG(3,159,2) = 0
-    DEG(3,159,3) = 0
-    DEG(3,159,4) = 0
-    DEG(3,159,5) = 0
-    DEG(3,159,6) = 0
-    DEG(3,159,7) = 1
-    DEG(3,159,8) = 0
-    DEG(3,159,9) = 0
-    DEG(3,159,10) = 1
-    DEG(3,159,11) = 0
-    DEG(3,159,12) = 0
-  COEF(3,159) = (-0.04727364378621059, 0)
-    DEG(3,160,1) = 1
-    DEG(3,160,2) = 0
-    DEG(3,160,3) = 0
-    DEG(3,160,4) = 1
-    DEG(3,160,5) = 0
-    DEG(3,160,6) = 0
-    DEG(3,160,7) = 1
-    DEG(3,160,8) = 0
-    DEG(3,160,9) = 0
-    DEG(3,160,10) = 1
-    DEG(3,160,11) = 0
-    DEG(3,160,12) = 0
-  COEF(3,160) = (0.04727364378621059, 0)
-    DEG(3,161,1) = 1
-    DEG(3,161,2) = 0
-    DEG(3,161,3) = 0
-    DEG(3,161,4) = 0
-    DEG(3,161,5) = 1
-    DEG(3,161,6) = 0
-    DEG(3,161,7) = 1
-    DEG(3,161,8) = 0
-    DEG(3,161,9) = 0
-    DEG(3,161,10) = 1
-    DEG(3,161,11) = 0
-    DEG(3,161,12) = 0
-  COEF(3,161) = (0.1663918840323012, 0)
-    DEG(3,162,1) = 1
-    DEG(3,162,2) = 0
-    DEG(3,162,3) = 0
-    DEG(3,162,4) = 0
-    DEG(3,162,5) = 0
-    DEG(3,162,6) = 1
-    DEG(3,162,7) = 1
-    DEG(3,162,8) = 0
-    DEG(3,162,9) = 0
-    DEG(3,162,10) = 1
-    DEG(3,162,11) = 0
-    DEG(3,162,12) = 0
-  COEF(3,162) = (0.7640063794320985, 0)
-    DEG(3,163,1) = 0
-    DEG(3,163,2) = 0
-    DEG(3,163,3) = 0
-    DEG(3,163,4) = 0
-    DEG(3,163,5) = 0
-    DEG(3,163,6) = 0
-    DEG(3,163,7) = 0
-    DEG(3,163,8) = 1
-    DEG(3,163,9) = 0
-    DEG(3,163,10) = 1
-    DEG(3,163,11) = 0
-    DEG(3,163,12) = 0
-  COEF(3,163) = (-0.13758722161297898, 0)
-    DEG(3,164,1) = 1
-    DEG(3,164,2) = 0
-    DEG(3,164,3) = 0
-    DEG(3,164,4) = 1
-    DEG(3,164,5) = 0
-    DEG(3,164,6) = 0
-    DEG(3,164,7) = 0
-    DEG(3,164,8) = 1
-    DEG(3,164,9) = 0
-    DEG(3,164,10) = 1
-    DEG(3,164,11) = 0
-    DEG(3,164,12) = 0
-  COEF(3,164) = (0.13758722161297898, 0)
-    DEG(3,165,1) = 1
-    DEG(3,165,2) = 0
-    DEG(3,165,3) = 0
-    DEG(3,165,4) = 0
-    DEG(3,165,5) = 1
-    DEG(3,165,6) = 0
-    DEG(3,165,7) = 0
-    DEG(3,165,8) = 1
-    DEG(3,165,9) = 0
-    DEG(3,165,10) = 1
-    DEG(3,165,11) = 0
-    DEG(3,165,12) = 0
-  COEF(3,165) = (0.753340446910739, 0)
-    DEG(3,166,1) = 1
-    DEG(3,166,2) = 0
-    DEG(3,166,3) = 0
-    DEG(3,166,4) = 0
-    DEG(3,166,5) = 0
-    DEG(3,166,6) = 1
-    DEG(3,166,7) = 0
-    DEG(3,166,8) = 1
-    DEG(3,166,9) = 0
-    DEG(3,166,10) = 1
-    DEG(3,166,11) = 0
-    DEG(3,166,12) = 0
-  COEF(3,166) = (3.0985913193704686, 0)
-    DEG(3,167,1) = 0
-    DEG(3,167,2) = 0
-    DEG(3,167,3) = 0
-    DEG(3,167,4) = 0
-    DEG(3,167,5) = 0
-    DEG(3,167,6) = 0
-    DEG(3,167,7) = 0
-    DEG(3,167,8) = 0
-    DEG(3,167,9) = 1
-    DEG(3,167,10) = 1
-    DEG(3,167,11) = 0
-    DEG(3,167,12) = 0
-  COEF(3,167) = (-1.9174960031695152, 0)
-    DEG(3,168,1) = 1
-    DEG(3,168,2) = 0
-    DEG(3,168,3) = 0
-    DEG(3,168,4) = 1
-    DEG(3,168,5) = 0
-    DEG(3,168,6) = 0
-    DEG(3,168,7) = 0
-    DEG(3,168,8) = 0
-    DEG(3,168,9) = 1
-    DEG(3,168,10) = 1
-    DEG(3,168,11) = 0
-    DEG(3,168,12) = 0
-  COEF(3,168) = (1.9174960031695152, 0)
-    DEG(3,169,1) = 1
-    DEG(3,169,2) = 0
-    DEG(3,169,3) = 0
-    DEG(3,169,4) = 0
-    DEG(3,169,5) = 1
-    DEG(3,169,6) = 0
-    DEG(3,169,7) = 0
-    DEG(3,169,8) = 0
-    DEG(3,169,9) = 1
-    DEG(3,169,10) = 1
-    DEG(3,169,11) = 0
-    DEG(3,169,12) = 0
-  COEF(3,169) = (-2.612880924623053, 0)
-    DEG(3,170,1) = 1
-    DEG(3,170,2) = 0
-    DEG(3,170,3) = 0
-    DEG(3,170,4) = 0
-    DEG(3,170,5) = 0
-    DEG(3,170,6) = 1
-    DEG(3,170,7) = 0
-    DEG(3,170,8) = 0
-    DEG(3,170,9) = 1
-    DEG(3,170,10) = 1
-    DEG(3,170,11) = 0
-    DEG(3,170,12) = 0
-  COEF(3,170) = (0.5444231033046502, 0)
-    DEG(3,171,1) = 0
-    DEG(3,171,2) = 0
-    DEG(3,171,3) = 0
-    DEG(3,171,4) = 0
-    DEG(3,171,5) = 0
-    DEG(3,171,6) = 0
-    DEG(3,171,7) = 0
-    DEG(3,171,8) = 0
-    DEG(3,171,9) = 0
-    DEG(3,171,10) = 0
-    DEG(3,171,11) = 1
-    DEG(3,171,12) = 0
-  COEF(3,171) = (-1.8603024879203394, 0)
-    DEG(3,172,1) = 0
-    DEG(3,172,2) = 1
-    DEG(3,172,3) = 0
-    DEG(3,172,4) = 1
-    DEG(3,172,5) = 0
-    DEG(3,172,6) = 0
-    DEG(3,172,7) = 0
-    DEG(3,172,8) = 0
-    DEG(3,172,9) = 0
-    DEG(3,172,10) = 0
-    DEG(3,172,11) = 1
-    DEG(3,172,12) = 0
-  COEF(3,172) = (1.3541365871068656, 0)
-    DEG(3,173,1) = 0
-    DEG(3,173,2) = 1
-    DEG(3,173,3) = 0
-    DEG(3,173,4) = 0
-    DEG(3,173,5) = 1
-    DEG(3,173,6) = 0
-    DEG(3,173,7) = 0
-    DEG(3,173,8) = 0
-    DEG(3,173,9) = 0
-    DEG(3,173,10) = 0
-    DEG(3,173,11) = 1
-    DEG(3,173,12) = 0
-  COEF(3,173) = (1.8603024879203394, 0)
-    DEG(3,174,1) = 0
-    DEG(3,174,2) = 1
-    DEG(3,174,3) = 0
-    DEG(3,174,4) = 0
-    DEG(3,174,5) = 0
-    DEG(3,174,6) = 1
-    DEG(3,174,7) = 0
-    DEG(3,174,8) = 0
-    DEG(3,174,9) = 0
-    DEG(3,174,10) = 0
-    DEG(3,174,11) = 1
-    DEG(3,174,12) = 0
-  COEF(3,174) = (-0.32643980823868707, 0)
-    DEG(3,175,1) = 0
-    DEG(3,175,2) = 0
-    DEG(3,175,3) = 0
-    DEG(3,175,4) = 0
-    DEG(3,175,5) = 0
-    DEG(3,175,6) = 0
-    DEG(3,175,7) = 1
-    DEG(3,175,8) = 0
-    DEG(3,175,9) = 0
-    DEG(3,175,10) = 0
-    DEG(3,175,11) = 1
-    DEG(3,175,12) = 0
-  COEF(3,175) = (-0.1663918840323012, 0)
-    DEG(3,176,1) = 0
-    DEG(3,176,2) = 1
-    DEG(3,176,3) = 0
-    DEG(3,176,4) = 1
-    DEG(3,176,5) = 0
-    DEG(3,176,6) = 0
-    DEG(3,176,7) = 1
-    DEG(3,176,8) = 0
-    DEG(3,176,9) = 0
-    DEG(3,176,10) = 0
-    DEG(3,176,11) = 1
-    DEG(3,176,12) = 0
-  COEF(3,176) = (0.04727364378621059, 0)
-    DEG(3,177,1) = 0
-    DEG(3,177,2) = 1
-    DEG(3,177,3) = 0
-    DEG(3,177,4) = 0
-    DEG(3,177,5) = 1
-    DEG(3,177,6) = 0
-    DEG(3,177,7) = 1
-    DEG(3,177,8) = 0
-    DEG(3,177,9) = 0
-    DEG(3,177,10) = 0
-    DEG(3,177,11) = 1
-    DEG(3,177,12) = 0
-  COEF(3,177) = (0.1663918840323012, 0)
-    DEG(3,178,1) = 0
-    DEG(3,178,2) = 1
-    DEG(3,178,3) = 0
-    DEG(3,178,4) = 0
-    DEG(3,178,5) = 0
-    DEG(3,178,6) = 1
-    DEG(3,178,7) = 1
-    DEG(3,178,8) = 0
-    DEG(3,178,9) = 0
-    DEG(3,178,10) = 0
-    DEG(3,178,11) = 1
-    DEG(3,178,12) = 0
-  COEF(3,178) = (0.7640063794320985, 0)
-    DEG(3,179,1) = 0
-    DEG(3,179,2) = 0
-    DEG(3,179,3) = 0
-    DEG(3,179,4) = 0
-    DEG(3,179,5) = 0
-    DEG(3,179,6) = 0
-    DEG(3,179,7) = 0
-    DEG(3,179,8) = 1
-    DEG(3,179,9) = 0
-    DEG(3,179,10) = 0
-    DEG(3,179,11) = 1
-    DEG(3,179,12) = 0
-  COEF(3,179) = (-0.753340446910739, 0)
-    DEG(3,180,1) = 0
-    DEG(3,180,2) = 1
-    DEG(3,180,3) = 0
-    DEG(3,180,4) = 1
-    DEG(3,180,5) = 0
-    DEG(3,180,6) = 0
-    DEG(3,180,7) = 0
-    DEG(3,180,8) = 1
-    DEG(3,180,9) = 0
-    DEG(3,180,10) = 0
-    DEG(3,180,11) = 1
-    DEG(3,180,12) = 0
-  COEF(3,180) = (0.13758722161297898, 0)
-    DEG(3,181,1) = 0
-    DEG(3,181,2) = 1
-    DEG(3,181,3) = 0
-    DEG(3,181,4) = 0
-    DEG(3,181,5) = 1
-    DEG(3,181,6) = 0
-    DEG(3,181,7) = 0
-    DEG(3,181,8) = 1
-    DEG(3,181,9) = 0
-    DEG(3,181,10) = 0
-    DEG(3,181,11) = 1
-    DEG(3,181,12) = 0
-  COEF(3,181) = (0.753340446910739, 0)
-    DEG(3,182,1) = 0
-    DEG(3,182,2) = 1
-    DEG(3,182,3) = 0
-    DEG(3,182,4) = 0
-    DEG(3,182,5) = 0
-    DEG(3,182,6) = 1
-    DEG(3,182,7) = 0
-    DEG(3,182,8) = 1
-    DEG(3,182,9) = 0
-    DEG(3,182,10) = 0
-    DEG(3,182,11) = 1
-    DEG(3,182,12) = 0
-  COEF(3,182) = (3.0985913193704686, 0)
-    DEG(3,183,1) = 0
-    DEG(3,183,2) = 0
-    DEG(3,183,3) = 0
-    DEG(3,183,4) = 0
-    DEG(3,183,5) = 0
-    DEG(3,183,6) = 0
-    DEG(3,183,7) = 0
-    DEG(3,183,8) = 0
-    DEG(3,183,9) = 1
-    DEG(3,183,10) = 0
-    DEG(3,183,11) = 1
-    DEG(3,183,12) = 0
-  COEF(3,183) = (2.612880924623053, 0)
-    DEG(3,184,1) = 0
-    DEG(3,184,2) = 1
-    DEG(3,184,3) = 0
-    DEG(3,184,4) = 1
-    DEG(3,184,5) = 0
-    DEG(3,184,6) = 0
-    DEG(3,184,7) = 0
-    DEG(3,184,8) = 0
-    DEG(3,184,9) = 1
-    DEG(3,184,10) = 0
-    DEG(3,184,11) = 1
-    DEG(3,184,12) = 0
-  COEF(3,184) = (1.9174960031695152, 0)
-    DEG(3,185,1) = 0
-    DEG(3,185,2) = 1
-    DEG(3,185,3) = 0
-    DEG(3,185,4) = 0
-    DEG(3,185,5) = 1
-    DEG(3,185,6) = 0
-    DEG(3,185,7) = 0
-    DEG(3,185,8) = 0
-    DEG(3,185,9) = 1
-    DEG(3,185,10) = 0
-    DEG(3,185,11) = 1
-    DEG(3,185,12) = 0
-  COEF(3,185) = (-2.612880924623053, 0)
-    DEG(3,186,1) = 0
-    DEG(3,186,2) = 1
-    DEG(3,186,3) = 0
-    DEG(3,186,4) = 0
-    DEG(3,186,5) = 0
-    DEG(3,186,6) = 1
-    DEG(3,186,7) = 0
-    DEG(3,186,8) = 0
-    DEG(3,186,9) = 1
-    DEG(3,186,10) = 0
-    DEG(3,186,11) = 1
-    DEG(3,186,12) = 0
-  COEF(3,186) = (0.5444231033046502, 0)
-    DEG(3,187,1) = 0
-    DEG(3,187,2) = 0
-    DEG(3,187,3) = 0
-    DEG(3,187,4) = 0
-    DEG(3,187,5) = 0
-    DEG(3,187,6) = 0
-    DEG(3,187,7) = 0
-    DEG(3,187,8) = 0
-    DEG(3,187,9) = 0
-    DEG(3,187,10) = 0
-    DEG(3,187,11) = 0
-    DEG(3,187,12) = 1
-  COEF(3,187) = (0.32643980823868707, 0)
-    DEG(3,188,1) = 0
-    DEG(3,188,2) = 0
-    DEG(3,188,3) = 1
-    DEG(3,188,4) = 1
-    DEG(3,188,5) = 0
-    DEG(3,188,6) = 0
-    DEG(3,188,7) = 0
-    DEG(3,188,8) = 0
-    DEG(3,188,9) = 0
-    DEG(3,188,10) = 0
-    DEG(3,188,11) = 0
-    DEG(3,188,12) = 1
-  COEF(3,188) = (1.3541365871068656, 0)
-    DEG(3,189,1) = 0
-    DEG(3,189,2) = 0
-    DEG(3,189,3) = 1
-    DEG(3,189,4) = 0
-    DEG(3,189,5) = 1
-    DEG(3,189,6) = 0
-    DEG(3,189,7) = 0
-    DEG(3,189,8) = 0
-    DEG(3,189,9) = 0
-    DEG(3,189,10) = 0
-    DEG(3,189,11) = 0
-    DEG(3,189,12) = 1
-  COEF(3,189) = (1.8603024879203394, 0)
-    DEG(3,190,1) = 0
-    DEG(3,190,2) = 0
-    DEG(3,190,3) = 1
-    DEG(3,190,4) = 0
-    DEG(3,190,5) = 0
-    DEG(3,190,6) = 1
-    DEG(3,190,7) = 0
-    DEG(3,190,8) = 0
-    DEG(3,190,9) = 0
-    DEG(3,190,10) = 0
-    DEG(3,190,11) = 0
-    DEG(3,190,12) = 1
-  COEF(3,190) = (-0.32643980823868707, 0)
-    DEG(3,191,1) = 0
-    DEG(3,191,2) = 0
-    DEG(3,191,3) = 0
-    DEG(3,191,4) = 0
-    DEG(3,191,5) = 0
-    DEG(3,191,6) = 0
-    DEG(3,191,7) = 1
-    DEG(3,191,8) = 0
-    DEG(3,191,9) = 0
-    DEG(3,191,10) = 0
-    DEG(3,191,11) = 0
-    DEG(3,191,12) = 1
-  COEF(3,191) = (-0.7640063794320985, 0)
-    DEG(3,192,1) = 0
-    DEG(3,192,2) = 0
-    DEG(3,192,3) = 1
-    DEG(3,192,4) = 1
-    DEG(3,192,5) = 0
-    DEG(3,192,6) = 0
-    DEG(3,192,7) = 1
-    DEG(3,192,8) = 0
-    DEG(3,192,9) = 0
-    DEG(3,192,10) = 0
-    DEG(3,192,11) = 0
-    DEG(3,192,12) = 1
-  COEF(3,192) = (0.04727364378621059, 0)
-    DEG(3,193,1) = 0
-    DEG(3,193,2) = 0
-    DEG(3,193,3) = 1
-    DEG(3,193,4) = 0
-    DEG(3,193,5) = 1
-    DEG(3,193,6) = 0
-    DEG(3,193,7) = 1
-    DEG(3,193,8) = 0
-    DEG(3,193,9) = 0
-    DEG(3,193,10) = 0
-    DEG(3,193,11) = 0
-    DEG(3,193,12) = 1
-  COEF(3,193) = (0.1663918840323012, 0)
-    DEG(3,194,1) = 0
-    DEG(3,194,2) = 0
-    DEG(3,194,3) = 1
-    DEG(3,194,4) = 0
-    DEG(3,194,5) = 0
-    DEG(3,194,6) = 1
-    DEG(3,194,7) = 1
-    DEG(3,194,8) = 0
-    DEG(3,194,9) = 0
-    DEG(3,194,10) = 0
-    DEG(3,194,11) = 0
-    DEG(3,194,12) = 1
-  COEF(3,194) = (0.7640063794320985, 0)
-    DEG(3,195,1) = 0
-    DEG(3,195,2) = 0
-    DEG(3,195,3) = 0
-    DEG(3,195,4) = 0
-    DEG(3,195,5) = 0
-    DEG(3,195,6) = 0
-    DEG(3,195,7) = 0
-    DEG(3,195,8) = 1
-    DEG(3,195,9) = 0
-    DEG(3,195,10) = 0
-    DEG(3,195,11) = 0
-    DEG(3,195,12) = 1
-  COEF(3,195) = (-3.0985913193704686, 0)
-    DEG(3,196,1) = 0
-    DEG(3,196,2) = 0
-    DEG(3,196,3) = 1
-    DEG(3,196,4) = 1
-    DEG(3,196,5) = 0
-    DEG(3,196,6) = 0
-    DEG(3,196,7) = 0
-    DEG(3,196,8) = 1
-    DEG(3,196,9) = 0
-    DEG(3,196,10) = 0
-    DEG(3,196,11) = 0
-    DEG(3,196,12) = 1
-  COEF(3,196) = (0.13758722161297898, 0)
-    DEG(3,197,1) = 0
-    DEG(3,197,2) = 0
-    DEG(3,197,3) = 1
-    DEG(3,197,4) = 0
-    DEG(3,197,5) = 1
-    DEG(3,197,6) = 0
-    DEG(3,197,7) = 0
-    DEG(3,197,8) = 1
-    DEG(3,197,9) = 0
-    DEG(3,197,10) = 0
-    DEG(3,197,11) = 0
-    DEG(3,197,12) = 1
-  COEF(3,197) = (0.753340446910739, 0)
-    DEG(3,198,1) = 0
-    DEG(3,198,2) = 0
-    DEG(3,198,3) = 1
-    DEG(3,198,4) = 0
-    DEG(3,198,5) = 0
-    DEG(3,198,6) = 1
-    DEG(3,198,7) = 0
-    DEG(3,198,8) = 1
-    DEG(3,198,9) = 0
-    DEG(3,198,10) = 0
-    DEG(3,198,11) = 0
-    DEG(3,198,12) = 1
-  COEF(3,198) = (3.0985913193704686, 0)
-    DEG(3,199,1) = 0
-    DEG(3,199,2) = 0
-    DEG(3,199,3) = 0
-    DEG(3,199,4) = 0
-    DEG(3,199,5) = 0
-    DEG(3,199,6) = 0
-    DEG(3,199,7) = 0
-    DEG(3,199,8) = 0
-    DEG(3,199,9) = 1
-    DEG(3,199,10) = 0
-    DEG(3,199,11) = 0
-    DEG(3,199,12) = 1
-  COEF(3,199) = (-0.5444231033046502, 0)
-    DEG(3,200,1) = 0
-    DEG(3,200,2) = 0
-    DEG(3,200,3) = 1
-    DEG(3,200,4) = 1
-    DEG(3,200,5) = 0
-    DEG(3,200,6) = 0
-    DEG(3,200,7) = 0
-    DEG(3,200,8) = 0
-    DEG(3,200,9) = 1
-    DEG(3,200,10) = 0
-    DEG(3,200,11) = 0
-    DEG(3,200,12) = 1
-  COEF(3,200) = (1.9174960031695152, 0)
-    DEG(3,201,1) = 0
-    DEG(3,201,2) = 0
-    DEG(3,201,3) = 1
-    DEG(3,201,4) = 0
-    DEG(3,201,5) = 1
-    DEG(3,201,6) = 0
-    DEG(3,201,7) = 0
-    DEG(3,201,8) = 0
-    DEG(3,201,9) = 1
-    DEG(3,201,10) = 0
-    DEG(3,201,11) = 0
-    DEG(3,201,12) = 1
-  COEF(3,201) = (-2.612880924623053, 0)
-    DEG(3,202,1) = 0
-    DEG(3,202,2) = 0
-    DEG(3,202,3) = 1
-    DEG(3,202,4) = 0
-    DEG(3,202,5) = 0
-    DEG(3,202,6) = 1
-    DEG(3,202,7) = 0
-    DEG(3,202,8) = 0
-    DEG(3,202,9) = 1
-    DEG(3,202,10) = 0
-    DEG(3,202,11) = 0
-    DEG(3,202,12) = 1
-  COEF(3,202) = (0.5444231033046502, 0)
-
-NUM_TERMS(4) = 202
-    DEG(4,1,1) = 0
-    DEG(4,1,2) = 0
-    DEG(4,1,3) = 0
-    DEG(4,1,4) = 0
-    DEG(4,1,5) = 0
-    DEG(4,1,6) = 0
-    DEG(4,1,7) = 0
-    DEG(4,1,8) = 0
-    DEG(4,1,9) = 0
-    DEG(4,1,10) = 0
-    DEG(4,1,11) = 0
-    DEG(4,1,12) = 0
-  COEF(4,1) = (-0.11674283259758135, 0)
-    DEG(4,2,1) = 1
-    DEG(4,2,2) = 0
-    DEG(4,2,3) = 0
-    DEG(4,2,4) = 1
-    DEG(4,2,5) = 0
-    DEG(4,2,6) = 0
-    DEG(4,2,7) = 0
-    DEG(4,2,8) = 0
-    DEG(4,2,9) = 0
-    DEG(4,2,10) = 0
-    DEG(4,2,11) = 0
-    DEG(4,2,12) = 0
-  COEF(4,2) = (1.9688373497862814, 0)
-    DEG(4,3,1) = 0
-    DEG(4,3,2) = 1
-    DEG(4,3,3) = 0
-    DEG(4,3,4) = 1
-    DEG(4,3,5) = 0
-    DEG(4,3,6) = 0
-    DEG(4,3,7) = 0
-    DEG(4,3,8) = 0
-    DEG(4,3,9) = 0
-    DEG(4,3,10) = 0
-    DEG(4,3,11) = 0
-    DEG(4,3,12) = 0
-  COEF(4,3) = (-0.08224923395460727, 0)
-    DEG(4,4,1) = 0
-    DEG(4,4,2) = 0
-    DEG(4,4,3) = 1
-    DEG(4,4,4) = 1
-    DEG(4,4,5) = 0
-    DEG(4,4,6) = 0
-    DEG(4,4,7) = 0
-    DEG(4,4,8) = 0
-    DEG(4,4,9) = 0
-    DEG(4,4,10) = 0
-    DEG(4,4,11) = 0
-    DEG(4,4,12) = 0
-  COEF(4,4) = (-0.2037566406834231, 0)
-    DEG(4,5,1) = 0
-    DEG(4,5,2) = 0
-    DEG(4,5,3) = 0
-    DEG(4,5,4) = 2
-    DEG(4,5,5) = 0
-    DEG(4,5,6) = 0
-    DEG(4,5,7) = 0
-    DEG(4,5,8) = 0
-    DEG(4,5,9) = 0
-    DEG(4,5,10) = 0
-    DEG(4,5,11) = 0
-    DEG(4,5,12) = 0
-  COEF(4,5) = (-0.9844186748931407, 0)
-    DEG(4,6,1) = 1
-    DEG(4,6,2) = 0
-    DEG(4,6,3) = 0
-    DEG(4,6,4) = 0
-    DEG(4,6,5) = 1
-    DEG(4,6,6) = 0
-    DEG(4,6,7) = 0
-    DEG(4,6,8) = 0
-    DEG(4,6,9) = 0
-    DEG(4,6,10) = 0
-    DEG(4,6,11) = 0
-    DEG(4,6,12) = 0
-  COEF(4,6) = (-0.08224923395460727, 0)
-    DEG(4,7,1) = 0
-    DEG(4,7,2) = 1
-    DEG(4,7,3) = 0
-    DEG(4,7,4) = 0
-    DEG(4,7,5) = 1
-    DEG(4,7,6) = 0
-    DEG(4,7,7) = 0
-    DEG(4,7,8) = 0
-    DEG(4,7,9) = 0
-    DEG(4,7,10) = 0
-    DEG(4,7,11) = 0
-    DEG(4,7,12) = 0
-  COEF(4,7) = (-0.1652112773132363, 0)
-    DEG(4,8,1) = 0
-    DEG(4,8,2) = 0
-    DEG(4,8,3) = 1
-    DEG(4,8,4) = 0
-    DEG(4,8,5) = 1
-    DEG(4,8,6) = 0
-    DEG(4,8,7) = 0
-    DEG(4,8,8) = 0
-    DEG(4,8,9) = 0
-    DEG(4,8,10) = 0
-    DEG(4,8,11) = 0
-    DEG(4,8,12) = 0
-  COEF(4,8) = (0.5265430939420082, 0)
-    DEG(4,9,1) = 0
-    DEG(4,9,2) = 0
-    DEG(4,9,3) = 0
-    DEG(4,9,4) = 1
-    DEG(4,9,5) = 1
-    DEG(4,9,6) = 0
-    DEG(4,9,7) = 0
-    DEG(4,9,8) = 0
-    DEG(4,9,9) = 0
-    DEG(4,9,10) = 0
-    DEG(4,9,11) = 0
-    DEG(4,9,12) = 0
-  COEF(4,9) = (0.08224923395460727, 0)
-    DEG(4,10,1) = 0
-    DEG(4,10,2) = 0
-    DEG(4,10,3) = 0
-    DEG(4,10,4) = 0
-    DEG(4,10,5) = 2
-    DEG(4,10,6) = 0
-    DEG(4,10,7) = 0
-    DEG(4,10,8) = 0
-    DEG(4,10,9) = 0
-    DEG(4,10,10) = 0
-    DEG(4,10,11) = 0
-    DEG(4,10,12) = 0
-  COEF(4,10) = (0.08260563865661814, 0)
-    DEG(4,11,1) = 1
-    DEG(4,11,2) = 0
-    DEG(4,11,3) = 0
-    DEG(4,11,4) = 0
-    DEG(4,11,5) = 0
-    DEG(4,11,6) = 1
-    DEG(4,11,7) = 0
-    DEG(4,11,8) = 0
-    DEG(4,11,9) = 0
-    DEG(4,11,10) = 0
-    DEG(4,11,11) = 0
-    DEG(4,11,12) = 0
-  COEF(4,11) = (-0.2037566406834231, 0)
-    DEG(4,12,1) = 0
-    DEG(4,12,2) = 1
-    DEG(4,12,3) = 0
-    DEG(4,12,4) = 0
-    DEG(4,12,5) = 0
-    DEG(4,12,6) = 1
-    DEG(4,12,7) = 0
-    DEG(4,12,8) = 0
-    DEG(4,12,9) = 0
-    DEG(4,12,10) = 0
-    DEG(4,12,11) = 0
-    DEG(4,12,12) = 0
-  COEF(4,12) = (0.5265430939420082, 0)
-    DEG(4,13,1) = 0
-    DEG(4,13,2) = 0
-    DEG(4,13,3) = 1
-    DEG(4,13,4) = 0
-    DEG(4,13,5) = 0
-    DEG(4,13,6) = 1
-    DEG(4,13,7) = 0
-    DEG(4,13,8) = 0
-    DEG(4,13,9) = 0
-    DEG(4,13,10) = 0
-    DEG(4,13,11) = 0
-    DEG(4,13,12) = 0
-  COEF(4,13) = (-1.5701404072778824, 0)
-    DEG(4,14,1) = 0
-    DEG(4,14,2) = 0
-    DEG(4,14,3) = 0
-    DEG(4,14,4) = 1
-    DEG(4,14,5) = 0
-    DEG(4,14,6) = 1
-    DEG(4,14,7) = 0
-    DEG(4,14,8) = 0
-    DEG(4,14,9) = 0
-    DEG(4,14,10) = 0
-    DEG(4,14,11) = 0
-    DEG(4,14,12) = 0
-  COEF(4,14) = (0.2037566406834231, 0)
-    DEG(4,15,1) = 0
-    DEG(4,15,2) = 0
-    DEG(4,15,3) = 0
-    DEG(4,15,4) = 0
-    DEG(4,15,5) = 1
-    DEG(4,15,6) = 1
-    DEG(4,15,7) = 0
-    DEG(4,15,8) = 0
-    DEG(4,15,9) = 0
-    DEG(4,15,10) = 0
-    DEG(4,15,11) = 0
-    DEG(4,15,12) = 0
-  COEF(4,15) = (-0.5265430939420082, 0)
-    DEG(4,16,1) = 0
-    DEG(4,16,2) = 0
-    DEG(4,16,3) = 0
-    DEG(4,16,4) = 0
-    DEG(4,16,5) = 0
-    DEG(4,16,6) = 2
-    DEG(4,16,7) = 0
-    DEG(4,16,8) = 0
-    DEG(4,16,9) = 0
-    DEG(4,16,10) = 0
-    DEG(4,16,11) = 0
-    DEG(4,16,12) = 0
-  COEF(4,16) = (0.7850702036389412, 0)
-    DEG(4,17,1) = 0
-    DEG(4,17,2) = 0
-    DEG(4,17,3) = 0
-    DEG(4,17,4) = 0
-    DEG(4,17,5) = 0
-    DEG(4,17,6) = 0
-    DEG(4,17,7) = 1
-    DEG(4,17,8) = 0
-    DEG(4,17,9) = 0
-    DEG(4,17,10) = 0
-    DEG(4,17,11) = 0
-    DEG(4,17,12) = 0
-  COEF(4,17) = (-2.0693018984535674, 0)
-    DEG(4,18,1) = 1
-    DEG(4,18,2) = 0
-    DEG(4,18,3) = 0
-    DEG(4,18,4) = 1
-    DEG(4,18,5) = 0
-    DEG(4,18,6) = 0
-    DEG(4,18,7) = 1
-    DEG(4,18,8) = 0
-    DEG(4,18,9) = 0
-    DEG(4,18,10) = 0
-    DEG(4,18,11) = 0
-    DEG(4,18,12) = 0
-  COEF(4,18) = (3.503921664046142, 0)
-    DEG(4,19,1) = 0
-    DEG(4,19,2) = 1
-    DEG(4,19,3) = 0
-    DEG(4,19,4) = 1
-    DEG(4,19,5) = 0
-    DEG(4,19,6) = 0
-    DEG(4,19,7) = 1
-    DEG(4,19,8) = 0
-    DEG(4,19,9) = 0
-    DEG(4,19,10) = 0
-    DEG(4,19,11) = 0
-    DEG(4,19,12) = 0
-  COEF(4,19) = (1.4072040150187837, 0)
-    DEG(4,20,1) = 0
-    DEG(4,20,2) = 0
-    DEG(4,20,3) = 1
-    DEG(4,20,4) = 1
-    DEG(4,20,5) = 0
-    DEG(4,20,6) = 0
-    DEG(4,20,7) = 1
-    DEG(4,20,8) = 0
-    DEG(4,20,9) = 0
-    DEG(4,20,10) = 0
-    DEG(4,20,11) = 0
-    DEG(4,20,12) = 0
-  COEF(4,20) = (-1.7531522485575015, 0)
-    DEG(4,21,1) = 0
-    DEG(4,21,2) = 0
-    DEG(4,21,3) = 0
-    DEG(4,21,4) = 2
-    DEG(4,21,5) = 0
-    DEG(4,21,6) = 0
-    DEG(4,21,7) = 1
-    DEG(4,21,8) = 0
-    DEG(4,21,9) = 0
-    DEG(4,21,10) = 0
-    DEG(4,21,11) = 0
-    DEG(4,21,12) = 0
-  COEF(4,21) = (-1.751960832023071, 0)
-    DEG(4,22,1) = 1
-    DEG(4,22,2) = 0
-    DEG(4,22,3) = 0
-    DEG(4,22,4) = 0
-    DEG(4,22,5) = 1
-    DEG(4,22,6) = 0
-    DEG(4,22,7) = 1
-    DEG(4,22,8) = 0
-    DEG(4,22,9) = 0
-    DEG(4,22,10) = 0
-    DEG(4,22,11) = 0
-    DEG(4,22,12) = 0
-  COEF(4,22) = (1.4072040150187837, 0)
-    DEG(4,23,1) = 0
-    DEG(4,23,2) = 1
-    DEG(4,23,3) = 0
-    DEG(4,23,4) = 0
-    DEG(4,23,5) = 1
-    DEG(4,23,6) = 0
-    DEG(4,23,7) = 1
-    DEG(4,23,8) = 0
-    DEG(4,23,9) = 0
-    DEG(4,23,10) = 0
-    DEG(4,23,11) = 0
-    DEG(4,23,12) = 0
-  COEF(4,23) = (-0.37329390585600786, 0)
-    DEG(4,24,1) = 0
-    DEG(4,24,2) = 0
-    DEG(4,24,3) = 1
-    DEG(4,24,4) = 0
-    DEG(4,24,5) = 1
-    DEG(4,24,6) = 0
-    DEG(4,24,7) = 1
-    DEG(4,24,8) = 0
-    DEG(4,24,9) = 0
-    DEG(4,24,10) = 0
-    DEG(4,24,11) = 0
-    DEG(4,24,12) = 0
-  COEF(4,24) = (0.18469460354659362, 0)
-    DEG(4,25,1) = 0
-    DEG(4,25,2) = 0
-    DEG(4,25,3) = 0
-    DEG(4,25,4) = 1
-    DEG(4,25,5) = 1
-    DEG(4,25,6) = 0
-    DEG(4,25,7) = 1
-    DEG(4,25,8) = 0
-    DEG(4,25,9) = 0
-    DEG(4,25,10) = 0
-    DEG(4,25,11) = 0
-    DEG(4,25,12) = 0
-  COEF(4,25) = (-1.4072040150187837, 0)
-    DEG(4,26,1) = 0
-    DEG(4,26,2) = 0
-    DEG(4,26,3) = 0
-    DEG(4,26,4) = 0
-    DEG(4,26,5) = 2
-    DEG(4,26,6) = 0
-    DEG(4,26,7) = 1
-    DEG(4,26,8) = 0
-    DEG(4,26,9) = 0
-    DEG(4,26,10) = 0
-    DEG(4,26,11) = 0
-    DEG(4,26,12) = 0
-  COEF(4,26) = (0.18664695292800393, 0)
-    DEG(4,27,1) = 1
-    DEG(4,27,2) = 0
-    DEG(4,27,3) = 0
-    DEG(4,27,4) = 0
-    DEG(4,27,5) = 0
-    DEG(4,27,6) = 1
-    DEG(4,27,7) = 1
-    DEG(4,27,8) = 0
-    DEG(4,27,9) = 0
-    DEG(4,27,10) = 0
-    DEG(4,27,11) = 0
-    DEG(4,27,12) = 0
-  COEF(4,27) = (-1.7531522485575015, 0)
-    DEG(4,28,1) = 0
-    DEG(4,28,2) = 1
-    DEG(4,28,3) = 0
-    DEG(4,28,4) = 0
-    DEG(4,28,5) = 0
-    DEG(4,28,6) = 1
-    DEG(4,28,7) = 1
-    DEG(4,28,8) = 0
-    DEG(4,28,9) = 0
-    DEG(4,28,10) = 0
-    DEG(4,28,11) = 0
-    DEG(4,28,12) = 0
-  COEF(4,28) = (0.18469460354659362, 0)
-    DEG(4,29,1) = 0
-    DEG(4,29,2) = 0
-    DEG(4,29,3) = 1
-    DEG(4,29,4) = 0
-    DEG(4,29,5) = 0
-    DEG(4,29,6) = 1
-    DEG(4,29,7) = 1
-    DEG(4,29,8) = 0
-    DEG(4,29,9) = 0
-    DEG(4,29,10) = 0
-    DEG(4,29,11) = 0
-    DEG(4,29,12) = 0
-  COEF(4,29) = (1.007976038717, 0)
-    DEG(4,30,1) = 0
-    DEG(4,30,2) = 0
-    DEG(4,30,3) = 0
-    DEG(4,30,4) = 1
-    DEG(4,30,5) = 0
-    DEG(4,30,6) = 1
-    DEG(4,30,7) = 1
-    DEG(4,30,8) = 0
-    DEG(4,30,9) = 0
-    DEG(4,30,10) = 0
-    DEG(4,30,11) = 0
-    DEG(4,30,12) = 0
-  COEF(4,30) = (1.7531522485575015, 0)
-    DEG(4,31,1) = 0
-    DEG(4,31,2) = 0
-    DEG(4,31,3) = 0
-    DEG(4,31,4) = 0
-    DEG(4,31,5) = 1
-    DEG(4,31,6) = 1
-    DEG(4,31,7) = 1
-    DEG(4,31,8) = 0
-    DEG(4,31,9) = 0
-    DEG(4,31,10) = 0
-    DEG(4,31,11) = 0
-    DEG(4,31,12) = 0
-  COEF(4,31) = (-0.18469460354659362, 0)
-    DEG(4,32,1) = 0
-    DEG(4,32,2) = 0
-    DEG(4,32,3) = 0
-    DEG(4,32,4) = 0
-    DEG(4,32,5) = 0
-    DEG(4,32,6) = 2
-    DEG(4,32,7) = 1
-    DEG(4,32,8) = 0
-    DEG(4,32,9) = 0
-    DEG(4,32,10) = 0
-    DEG(4,32,11) = 0
-    DEG(4,32,12) = 0
-  COEF(4,32) = (-0.5039880193585, 0)
-    DEG(4,33,1) = 1
-    DEG(4,33,2) = 0
-    DEG(4,33,3) = 0
-    DEG(4,33,4) = 1
-    DEG(4,33,5) = 0
-    DEG(4,33,6) = 0
-    DEG(4,33,7) = 2
-    DEG(4,33,8) = 0
-    DEG(4,33,9) = 0
-    DEG(4,33,10) = 0
-    DEG(4,33,11) = 0
-    DEG(4,33,12) = 0
-  COEF(4,33) = (-0.16034236627472923, 0)
-    DEG(4,34,1) = 0
-    DEG(4,34,2) = 1
-    DEG(4,34,3) = 0
-    DEG(4,34,4) = 1
-    DEG(4,34,5) = 0
-    DEG(4,34,6) = 0
-    DEG(4,34,7) = 2
-    DEG(4,34,8) = 0
-    DEG(4,34,9) = 0
-    DEG(4,34,10) = 0
-    DEG(4,34,11) = 0
-    DEG(4,34,12) = 0
-  COEF(4,34) = (1.3084699488830631, 0)
-    DEG(4,35,1) = 0
-    DEG(4,35,2) = 0
-    DEG(4,35,3) = 1
-    DEG(4,35,4) = 1
-    DEG(4,35,5) = 0
-    DEG(4,35,6) = 0
-    DEG(4,35,7) = 2
-    DEG(4,35,8) = 0
-    DEG(4,35,9) = 0
-    DEG(4,35,10) = 0
-    DEG(4,35,11) = 0
-    DEG(4,35,12) = 0
-  COEF(4,35) = (0.6058604756487289, 0)
-    DEG(4,36,1) = 0
-    DEG(4,36,2) = 0
-    DEG(4,36,3) = 0
-    DEG(4,36,4) = 2
-    DEG(4,36,5) = 0
-    DEG(4,36,6) = 0
-    DEG(4,36,7) = 2
-    DEG(4,36,8) = 0
-    DEG(4,36,9) = 0
-    DEG(4,36,10) = 0
-    DEG(4,36,11) = 0
-    DEG(4,36,12) = 0
-  COEF(4,36) = (0.08017118313736461, 0)
-    DEG(4,37,1) = 1
-    DEG(4,37,2) = 0
-    DEG(4,37,3) = 0
-    DEG(4,37,4) = 0
-    DEG(4,37,5) = 1
-    DEG(4,37,6) = 0
-    DEG(4,37,7) = 2
-    DEG(4,37,8) = 0
-    DEG(4,37,9) = 0
-    DEG(4,37,10) = 0
-    DEG(4,37,11) = 0
-    DEG(4,37,12) = 0
-  COEF(4,37) = (1.3084699488830631, 0)
-    DEG(4,38,1) = 0
-    DEG(4,38,2) = 1
-    DEG(4,38,3) = 0
-    DEG(4,38,4) = 0
-    DEG(4,38,5) = 1
-    DEG(4,38,6) = 0
-    DEG(4,38,7) = 2
-    DEG(4,38,8) = 0
-    DEG(4,38,9) = 0
-    DEG(4,38,10) = 0
-    DEG(4,38,11) = 0
-    DEG(4,38,12) = 0
-  COEF(4,38) = (0.32197255476569064, 0)
-    DEG(4,39,1) = 0
-    DEG(4,39,2) = 0
-    DEG(4,39,3) = 1
-    DEG(4,39,4) = 0
-    DEG(4,39,5) = 1
-    DEG(4,39,6) = 0
-    DEG(4,39,7) = 2
-    DEG(4,39,8) = 0
-    DEG(4,39,9) = 0
-    DEG(4,39,10) = 0
-    DEG(4,39,11) = 0
-    DEG(4,39,12) = 0
-  COEF(4,39) = (-0.10640181496766146, 0)
-    DEG(4,40,1) = 0
-    DEG(4,40,2) = 0
-    DEG(4,40,3) = 0
-    DEG(4,40,4) = 1
-    DEG(4,40,5) = 1
-    DEG(4,40,6) = 0
-    DEG(4,40,7) = 2
-    DEG(4,40,8) = 0
-    DEG(4,40,9) = 0
-    DEG(4,40,10) = 0
-    DEG(4,40,11) = 0
-    DEG(4,40,12) = 0
-  COEF(4,40) = (-1.3084699488830631, 0)
-    DEG(4,41,1) = 0
-    DEG(4,41,2) = 0
-    DEG(4,41,3) = 0
-    DEG(4,41,4) = 0
-    DEG(4,41,5) = 2
-    DEG(4,41,6) = 0
-    DEG(4,41,7) = 2
-    DEG(4,41,8) = 0
-    DEG(4,41,9) = 0
-    DEG(4,41,10) = 0
-    DEG(4,41,11) = 0
-    DEG(4,41,12) = 0
-  COEF(4,41) = (-0.16098627738284532, 0)
-    DEG(4,42,1) = 1
-    DEG(4,42,2) = 0
-    DEG(4,42,3) = 0
-    DEG(4,42,4) = 0
-    DEG(4,42,5) = 0
-    DEG(4,42,6) = 1
-    DEG(4,42,7) = 2
-    DEG(4,42,8) = 0
-    DEG(4,42,9) = 0
-    DEG(4,42,10) = 0
-    DEG(4,42,11) = 0
-    DEG(4,42,12) = 0
-  COEF(4,42) = (0.6058604756487289, 0)
-    DEG(4,43,1) = 0
-    DEG(4,43,2) = 1
-    DEG(4,43,3) = 0
-    DEG(4,43,4) = 0
-    DEG(4,43,5) = 0
-    DEG(4,43,6) = 1
-    DEG(4,43,7) = 2
-    DEG(4,43,8) = 0
-    DEG(4,43,9) = 0
-    DEG(4,43,10) = 0
-    DEG(4,43,11) = 0
-    DEG(4,43,12) = 0
-  COEF(4,43) = (-0.10640181496766146, 0)
-    DEG(4,44,1) = 0
-    DEG(4,44,2) = 0
-    DEG(4,44,3) = 1
-    DEG(4,44,4) = 0
-    DEG(4,44,5) = 0
-    DEG(4,44,6) = 1
-    DEG(4,44,7) = 2
-    DEG(4,44,8) = 0
-    DEG(4,44,9) = 0
-    DEG(4,44,10) = 0
-    DEG(4,44,11) = 0
-    DEG(4,44,12) = 0
-  COEF(4,44) = (-0.1616301884909614, 0)
-    DEG(4,45,1) = 0
-    DEG(4,45,2) = 0
-    DEG(4,45,3) = 0
-    DEG(4,45,4) = 1
-    DEG(4,45,5) = 0
-    DEG(4,45,6) = 1
-    DEG(4,45,7) = 2
-    DEG(4,45,8) = 0
-    DEG(4,45,9) = 0
-    DEG(4,45,10) = 0
-    DEG(4,45,11) = 0
-    DEG(4,45,12) = 0
-  COEF(4,45) = (-0.6058604756487289, 0)
-    DEG(4,46,1) = 0
-    DEG(4,46,2) = 0
-    DEG(4,46,3) = 0
-    DEG(4,46,4) = 0
-    DEG(4,46,5) = 1
-    DEG(4,46,6) = 1
-    DEG(4,46,7) = 2
-    DEG(4,46,8) = 0
-    DEG(4,46,9) = 0
-    DEG(4,46,10) = 0
-    DEG(4,46,11) = 0
-    DEG(4,46,12) = 0
-  COEF(4,46) = (0.10640181496766146, 0)
-    DEG(4,47,1) = 0
-    DEG(4,47,2) = 0
-    DEG(4,47,3) = 0
-    DEG(4,47,4) = 0
-    DEG(4,47,5) = 0
-    DEG(4,47,6) = 2
-    DEG(4,47,7) = 2
-    DEG(4,47,8) = 0
-    DEG(4,47,9) = 0
-    DEG(4,47,10) = 0
-    DEG(4,47,11) = 0
-    DEG(4,47,12) = 0
-  COEF(4,47) = (0.0808150942454807, 0)
-    DEG(4,48,1) = 0
-    DEG(4,48,2) = 0
-    DEG(4,48,3) = 0
-    DEG(4,48,4) = 0
-    DEG(4,48,5) = 0
-    DEG(4,48,6) = 0
-    DEG(4,48,7) = 0
-    DEG(4,48,8) = 1
-    DEG(4,48,9) = 0
-    DEG(4,48,10) = 0
-    DEG(4,48,11) = 0
-    DEG(4,48,12) = 0
-  COEF(4,48) = (-1.9922048131262136, 0)
-    DEG(4,49,1) = 1
-    DEG(4,49,2) = 0
-    DEG(4,49,3) = 0
-    DEG(4,49,4) = 1
-    DEG(4,49,5) = 0
-    DEG(4,49,6) = 0
-    DEG(4,49,7) = 0
-    DEG(4,49,8) = 1
-    DEG(4,49,9) = 0
-    DEG(4,49,10) = 0
-    DEG(4,49,11) = 0
-    DEG(4,49,12) = 0
-  COEF(4,49) = (0.6477624415382153, 0)
-    DEG(4,50,1) = 0
-    DEG(4,50,2) = 1
-    DEG(4,50,3) = 0
-    DEG(4,50,4) = 1
-    DEG(4,50,5) = 0
-    DEG(4,50,6) = 0
-    DEG(4,50,7) = 0
-    DEG(4,50,8) = 1
-    DEG(4,50,9) = 0
-    DEG(4,50,10) = 0
-    DEG(4,50,11) = 0
-    DEG(4,50,12) = 0
-  COEF(4,50) = (-0.8996872344002199, 0)
-    DEG(4,51,1) = 0
-    DEG(4,51,2) = 0
-    DEG(4,51,3) = 1
-    DEG(4,51,4) = 1
-    DEG(4,51,5) = 0
-    DEG(4,51,6) = 0
-    DEG(4,51,7) = 0
-    DEG(4,51,8) = 1
-    DEG(4,51,9) = 0
-    DEG(4,51,10) = 0
-    DEG(4,51,11) = 0
-    DEG(4,51,12) = 0
-  COEF(4,51) = (2.1439462825080398, 0)
-    DEG(4,52,1) = 0
-    DEG(4,52,2) = 0
-    DEG(4,52,3) = 0
-    DEG(4,52,4) = 2
-    DEG(4,52,5) = 0
-    DEG(4,52,6) = 0
-    DEG(4,52,7) = 0
-    DEG(4,52,8) = 1
-    DEG(4,52,9) = 0
-    DEG(4,52,10) = 0
-    DEG(4,52,11) = 0
-    DEG(4,52,12) = 0
-  COEF(4,52) = (-0.32388122076910764, 0)
-    DEG(4,53,1) = 1
-    DEG(4,53,2) = 0
-    DEG(4,53,3) = 0
-    DEG(4,53,4) = 0
-    DEG(4,53,5) = 1
-    DEG(4,53,6) = 0
-    DEG(4,53,7) = 0
-    DEG(4,53,8) = 1
-    DEG(4,53,9) = 0
-    DEG(4,53,10) = 0
-    DEG(4,53,11) = 0
-    DEG(4,53,12) = 0
-  COEF(4,53) = (-0.8996872344002199, 0)
-    DEG(4,54,1) = 0
-    DEG(4,54,2) = 1
-    DEG(4,54,3) = 0
-    DEG(4,54,4) = 0
-    DEG(4,54,5) = 1
-    DEG(4,54,6) = 0
-    DEG(4,54,7) = 0
-    DEG(4,54,8) = 1
-    DEG(4,54,9) = 0
-    DEG(4,54,10) = 0
-    DEG(4,54,11) = 0
-    DEG(4,54,12) = 0
-  COEF(4,54) = (0.3792836718619416, 0)
-    DEG(4,55,1) = 0
-    DEG(4,55,2) = 0
-    DEG(4,55,3) = 1
-    DEG(4,55,4) = 0
-    DEG(4,55,5) = 1
-    DEG(4,55,6) = 0
-    DEG(4,55,7) = 0
-    DEG(4,55,8) = 1
-    DEG(4,55,9) = 0
-    DEG(4,55,10) = 0
-    DEG(4,55,11) = 0
-    DEG(4,55,12) = 0
-  COEF(4,55) = (-1.0228168431718734, 0)
-    DEG(4,56,1) = 0
-    DEG(4,56,2) = 0
-    DEG(4,56,3) = 0
-    DEG(4,56,4) = 1
-    DEG(4,56,5) = 1
-    DEG(4,56,6) = 0
-    DEG(4,56,7) = 0
-    DEG(4,56,8) = 1
-    DEG(4,56,9) = 0
-    DEG(4,56,10) = 0
-    DEG(4,56,11) = 0
-    DEG(4,56,12) = 0
-  COEF(4,56) = (0.8996872344002199, 0)
-    DEG(4,57,1) = 0
-    DEG(4,57,2) = 0
-    DEG(4,57,3) = 0
-    DEG(4,57,4) = 0
-    DEG(4,57,5) = 2
-    DEG(4,57,6) = 0
-    DEG(4,57,7) = 0
-    DEG(4,57,8) = 1
-    DEG(4,57,9) = 0
-    DEG(4,57,10) = 0
-    DEG(4,57,11) = 0
-    DEG(4,57,12) = 0
-  COEF(4,57) = (-0.1896418359309708, 0)
-    DEG(4,58,1) = 1
-    DEG(4,58,2) = 0
-    DEG(4,58,3) = 0
-    DEG(4,58,4) = 0
-    DEG(4,58,5) = 0
-    DEG(4,58,6) = 1
-    DEG(4,58,7) = 0
-    DEG(4,58,8) = 1
-    DEG(4,58,9) = 0
-    DEG(4,58,10) = 0
-    DEG(4,58,11) = 0
-    DEG(4,58,12) = 0
-  COEF(4,58) = (2.1439462825080398, 0)
-    DEG(4,59,1) = 0
-    DEG(4,59,2) = 1
-    DEG(4,59,3) = 0
-    DEG(4,59,4) = 0
-    DEG(4,59,5) = 0
-    DEG(4,59,6) = 1
-    DEG(4,59,7) = 0
-    DEG(4,59,8) = 1
-    DEG(4,59,9) = 0
-    DEG(4,59,10) = 0
-    DEG(4,59,11) = 0
-    DEG(4,59,12) = 0
-  COEF(4,59) = (-1.0228168431718734, 0)
-    DEG(4,60,1) = 0
-    DEG(4,60,2) = 0
-    DEG(4,60,3) = 1
-    DEG(4,60,4) = 0
-    DEG(4,60,5) = 0
-    DEG(4,60,6) = 1
-    DEG(4,60,7) = 0
-    DEG(4,60,8) = 1
-    DEG(4,60,9) = 0
-    DEG(4,60,10) = 0
-    DEG(4,60,11) = 0
-    DEG(4,60,12) = 0
-  COEF(4,60) = (2.9573635128522704, 0)
-    DEG(4,61,1) = 0
-    DEG(4,61,2) = 0
-    DEG(4,61,3) = 0
-    DEG(4,61,4) = 1
-    DEG(4,61,5) = 0
-    DEG(4,61,6) = 1
-    DEG(4,61,7) = 0
-    DEG(4,61,8) = 1
-    DEG(4,61,9) = 0
-    DEG(4,61,10) = 0
-    DEG(4,61,11) = 0
-    DEG(4,61,12) = 0
-  COEF(4,61) = (-2.1439462825080398, 0)
-    DEG(4,62,1) = 0
-    DEG(4,62,2) = 0
-    DEG(4,62,3) = 0
-    DEG(4,62,4) = 0
-    DEG(4,62,5) = 1
-    DEG(4,62,6) = 1
-    DEG(4,62,7) = 0
-    DEG(4,62,8) = 1
-    DEG(4,62,9) = 0
-    DEG(4,62,10) = 0
-    DEG(4,62,11) = 0
-    DEG(4,62,12) = 0
-  COEF(4,62) = (1.0228168431718734, 0)
-    DEG(4,63,1) = 0
-    DEG(4,63,2) = 0
-    DEG(4,63,3) = 0
-    DEG(4,63,4) = 0
-    DEG(4,63,5) = 0
-    DEG(4,63,6) = 2
-    DEG(4,63,7) = 0
-    DEG(4,63,8) = 1
-    DEG(4,63,9) = 0
-    DEG(4,63,10) = 0
-    DEG(4,63,11) = 0
-    DEG(4,63,12) = 0
-  COEF(4,63) = (-1.4786817564261352, 0)
-    DEG(4,64,1) = 1
-    DEG(4,64,2) = 0
-    DEG(4,64,3) = 0
-    DEG(4,64,4) = 1
-    DEG(4,64,5) = 0
-    DEG(4,64,6) = 0
-    DEG(4,64,7) = 1
-    DEG(4,64,8) = 1
-    DEG(4,64,9) = 0
-    DEG(4,64,10) = 0
-    DEG(4,64,11) = 0
-    DEG(4,64,12) = 0
-  COEF(4,64) = (1.3748452718840887, 0)
-    DEG(4,65,1) = 0
-    DEG(4,65,2) = 1
-    DEG(4,65,3) = 0
-    DEG(4,65,4) = 1
-    DEG(4,65,5) = 0
-    DEG(4,65,6) = 0
-    DEG(4,65,7) = 1
-    DEG(4,65,8) = 1
-    DEG(4,65,9) = 0
-    DEG(4,65,10) = 0
-    DEG(4,65,11) = 0
-    DEG(4,65,12) = 0
-  COEF(4,65) = (-1.1355269333344171, 0)
-    DEG(4,66,1) = 0
-    DEG(4,66,2) = 0
-    DEG(4,66,3) = 1
-    DEG(4,66,4) = 1
-    DEG(4,66,5) = 0
-    DEG(4,66,6) = 0
-    DEG(4,66,7) = 1
-    DEG(4,66,8) = 1
-    DEG(4,66,9) = 0
-    DEG(4,66,10) = 0
-    DEG(4,66,11) = 0
-    DEG(4,66,12) = 0
-  COEF(4,66) = (3.2156498677475813, 0)
-    DEG(4,67,1) = 0
-    DEG(4,67,2) = 0
-    DEG(4,67,3) = 0
-    DEG(4,67,4) = 2
-    DEG(4,67,5) = 0
-    DEG(4,67,6) = 0
-    DEG(4,67,7) = 1
-    DEG(4,67,8) = 1
-    DEG(4,67,9) = 0
-    DEG(4,67,10) = 0
-    DEG(4,67,11) = 0
-    DEG(4,67,12) = 0
-  COEF(4,67) = (-0.6874226359420443, 0)
-    DEG(4,68,1) = 1
-    DEG(4,68,2) = 0
-    DEG(4,68,3) = 0
-    DEG(4,68,4) = 0
-    DEG(4,68,5) = 1
-    DEG(4,68,6) = 0
-    DEG(4,68,7) = 1
-    DEG(4,68,8) = 1
-    DEG(4,68,9) = 0
-    DEG(4,68,10) = 0
-    DEG(4,68,11) = 0
-    DEG(4,68,12) = 0
-  COEF(4,68) = (-1.1355269333344171, 0)
-    DEG(4,69,1) = 0
-    DEG(4,69,2) = 1
-    DEG(4,69,3) = 0
-    DEG(4,69,4) = 0
-    DEG(4,69,5) = 1
-    DEG(4,69,6) = 0
-    DEG(4,69,7) = 1
-    DEG(4,69,8) = 1
-    DEG(4,69,9) = 0
-    DEG(4,69,10) = 0
-    DEG(4,69,11) = 0
-    DEG(4,69,12) = 0
-  COEF(4,69) = (-0.45253536139567435, 0)
-    DEG(4,70,1) = 0
-    DEG(4,70,2) = 0
-    DEG(4,70,3) = 1
-    DEG(4,70,4) = 0
-    DEG(4,70,5) = 1
-    DEG(4,70,6) = 0
-    DEG(4,70,7) = 1
-    DEG(4,70,8) = 1
-    DEG(4,70,9) = 0
-    DEG(4,70,10) = 0
-    DEG(4,70,11) = 0
-    DEG(4,70,12) = 0
-  COEF(4,70) = (0.5091454471521561, 0)
-    DEG(4,71,1) = 0
-    DEG(4,71,2) = 0
-    DEG(4,71,3) = 0
-    DEG(4,71,4) = 1
-    DEG(4,71,5) = 1
-    DEG(4,71,6) = 0
-    DEG(4,71,7) = 1
-    DEG(4,71,8) = 1
-    DEG(4,71,9) = 0
-    DEG(4,71,10) = 0
-    DEG(4,71,11) = 0
-    DEG(4,71,12) = 0
-  COEF(4,71) = (1.1355269333344171, 0)
-    DEG(4,72,1) = 0
-    DEG(4,72,2) = 0
-    DEG(4,72,3) = 0
-    DEG(4,72,4) = 0
-    DEG(4,72,5) = 2
-    DEG(4,72,6) = 0
-    DEG(4,72,7) = 1
-    DEG(4,72,8) = 1
-    DEG(4,72,9) = 0
-    DEG(4,72,10) = 0
-    DEG(4,72,11) = 0
-    DEG(4,72,12) = 0
-  COEF(4,72) = (0.22626768069783718, 0)
-    DEG(4,73,1) = 1
-    DEG(4,73,2) = 0
-    DEG(4,73,3) = 0
-    DEG(4,73,4) = 0
-    DEG(4,73,5) = 0
-    DEG(4,73,6) = 1
-    DEG(4,73,7) = 1
-    DEG(4,73,8) = 1
-    DEG(4,73,9) = 0
-    DEG(4,73,10) = 0
-    DEG(4,73,11) = 0
-    DEG(4,73,12) = 0
-  COEF(4,73) = (3.2156498677475813, 0)
-    DEG(4,74,1) = 0
-    DEG(4,74,2) = 1
-    DEG(4,74,3) = 0
-    DEG(4,74,4) = 0
-    DEG(4,74,5) = 0
-    DEG(4,74,6) = 1
-    DEG(4,74,7) = 1
-    DEG(4,74,8) = 1
-    DEG(4,74,9) = 0
-    DEG(4,74,10) = 0
-    DEG(4,74,11) = 0
-    DEG(4,74,12) = 0
-  COEF(4,74) = (0.5091454471521561, 0)
-    DEG(4,75,1) = 0
-    DEG(4,75,2) = 0
-    DEG(4,75,3) = 1
-    DEG(4,75,4) = 0
-    DEG(4,75,5) = 0
-    DEG(4,75,6) = 1
-    DEG(4,75,7) = 1
-    DEG(4,75,8) = 1
-    DEG(4,75,9) = 0
-    DEG(4,75,10) = 0
-    DEG(4,75,11) = 0
-    DEG(4,75,12) = 0
-  COEF(4,75) = (-0.9223099104884144, 0)
-    DEG(4,76,1) = 0
-    DEG(4,76,2) = 0
-    DEG(4,76,3) = 0
-    DEG(4,76,4) = 1
-    DEG(4,76,5) = 0
-    DEG(4,76,6) = 1
-    DEG(4,76,7) = 1
-    DEG(4,76,8) = 1
-    DEG(4,76,9) = 0
-    DEG(4,76,10) = 0
-    DEG(4,76,11) = 0
-    DEG(4,76,12) = 0
-  COEF(4,76) = (-3.2156498677475813, 0)
-    DEG(4,77,1) = 0
-    DEG(4,77,2) = 0
-    DEG(4,77,3) = 0
-    DEG(4,77,4) = 0
-    DEG(4,77,5) = 1
-    DEG(4,77,6) = 1
-    DEG(4,77,7) = 1
-    DEG(4,77,8) = 1
-    DEG(4,77,9) = 0
-    DEG(4,77,10) = 0
-    DEG(4,77,11) = 0
-    DEG(4,77,12) = 0
-  COEF(4,77) = (-0.5091454471521561, 0)
-    DEG(4,78,1) = 0
-    DEG(4,78,2) = 0
-    DEG(4,78,3) = 0
-    DEG(4,78,4) = 0
-    DEG(4,78,5) = 0
-    DEG(4,78,6) = 2
-    DEG(4,78,7) = 1
-    DEG(4,78,8) = 1
-    DEG(4,78,9) = 0
-    DEG(4,78,10) = 0
-    DEG(4,78,11) = 0
-    DEG(4,78,12) = 0
-  COEF(4,78) = (0.4611549552442072, 0)
-    DEG(4,79,1) = 1
-    DEG(4,79,2) = 0
-    DEG(4,79,3) = 0
-    DEG(4,79,4) = 1
-    DEG(4,79,5) = 0
-    DEG(4,79,6) = 0
-    DEG(4,79,7) = 0
-    DEG(4,79,8) = 2
-    DEG(4,79,9) = 0
-    DEG(4,79,10) = 0
-    DEG(4,79,11) = 0
-    DEG(4,79,12) = 0
-  COEF(4,79) = (-0.03941722664169168, 0)
-    DEG(4,80,1) = 0
-    DEG(4,80,2) = 1
-    DEG(4,80,3) = 0
-    DEG(4,80,4) = 1
-    DEG(4,80,5) = 0
-    DEG(4,80,6) = 0
-    DEG(4,80,7) = 0
-    DEG(4,80,8) = 2
-    DEG(4,80,9) = 0
-    DEG(4,80,10) = 0
-    DEG(4,80,11) = 0
-    DEG(4,80,12) = 0
-  COEF(4,80) = (-0.008183860050218508, 0)
-    DEG(4,81,1) = 0
-    DEG(4,81,2) = 0
-    DEG(4,81,3) = 1
-    DEG(4,81,4) = 1
-    DEG(4,81,5) = 0
-    DEG(4,81,6) = 0
-    DEG(4,81,7) = 0
-    DEG(4,81,8) = 2
-    DEG(4,81,9) = 0
-    DEG(4,81,10) = 0
-    DEG(4,81,11) = 0
-    DEG(4,81,12) = 0
-  COEF(4,81) = (-0.10667044925375369, 0)
-    DEG(4,82,1) = 0
-    DEG(4,82,2) = 0
-    DEG(4,82,3) = 0
-    DEG(4,82,4) = 2
-    DEG(4,82,5) = 0
-    DEG(4,82,6) = 0
-    DEG(4,82,7) = 0
-    DEG(4,82,8) = 2
-    DEG(4,82,9) = 0
-    DEG(4,82,10) = 0
-    DEG(4,82,11) = 0
-    DEG(4,82,12) = 0
-  COEF(4,82) = (0.01970861332084584, 0)
-    DEG(4,83,1) = 1
-    DEG(4,83,2) = 0
-    DEG(4,83,3) = 0
-    DEG(4,83,4) = 0
-    DEG(4,83,5) = 1
-    DEG(4,83,6) = 0
-    DEG(4,83,7) = 0
-    DEG(4,83,8) = 2
-    DEG(4,83,9) = 0
-    DEG(4,83,10) = 0
-    DEG(4,83,11) = 0
-    DEG(4,83,12) = 0
-  COEF(4,83) = (-0.008183860050218508, 0)
-    DEG(4,84,1) = 0
-    DEG(4,84,2) = 1
-    DEG(4,84,3) = 0
-    DEG(4,84,4) = 0
-    DEG(4,84,5) = 1
-    DEG(4,84,6) = 0
-    DEG(4,84,7) = 0
-    DEG(4,84,8) = 2
-    DEG(4,84,9) = 0
-    DEG(4,84,10) = 0
-    DEG(4,84,11) = 0
-    DEG(4,84,12) = 0
-  COEF(4,84) = (0.14650450237046156, 0)
-    DEG(4,85,1) = 0
-    DEG(4,85,2) = 0
-    DEG(4,85,3) = 1
-    DEG(4,85,4) = 0
-    DEG(4,85,5) = 1
-    DEG(4,85,6) = 0
-    DEG(4,85,7) = 0
-    DEG(4,85,8) = 2
-    DEG(4,85,9) = 0
-    DEG(4,85,10) = 0
-    DEG(4,85,11) = 0
-    DEG(4,85,12) = 0
-  COEF(4,85) = (-0.18619363019958798, 0)
-    DEG(4,86,1) = 0
-    DEG(4,86,2) = 0
-    DEG(4,86,3) = 0
-    DEG(4,86,4) = 1
-    DEG(4,86,5) = 1
-    DEG(4,86,6) = 0
-    DEG(4,86,7) = 0
-    DEG(4,86,8) = 2
-    DEG(4,86,9) = 0
-    DEG(4,86,10) = 0
-    DEG(4,86,11) = 0
-    DEG(4,86,12) = 0
-  COEF(4,86) = (0.008183860050218508, 0)
-    DEG(4,87,1) = 0
-    DEG(4,87,2) = 0
-    DEG(4,87,3) = 0
-    DEG(4,87,4) = 0
-    DEG(4,87,5) = 2
-    DEG(4,87,6) = 0
-    DEG(4,87,7) = 0
-    DEG(4,87,8) = 2
-    DEG(4,87,9) = 0
-    DEG(4,87,10) = 0
-    DEG(4,87,11) = 0
-    DEG(4,87,12) = 0
-  COEF(4,87) = (-0.07325225118523078, 0)
-    DEG(4,88,1) = 1
-    DEG(4,88,2) = 0
-    DEG(4,88,3) = 0
-    DEG(4,88,4) = 0
-    DEG(4,88,5) = 0
-    DEG(4,88,6) = 1
-    DEG(4,88,7) = 0
-    DEG(4,88,8) = 2
-    DEG(4,88,9) = 0
-    DEG(4,88,10) = 0
-    DEG(4,88,11) = 0
-    DEG(4,88,12) = 0
-  COEF(4,88) = (-0.10667044925375369, 0)
-    DEG(4,89,1) = 0
-    DEG(4,89,2) = 1
-    DEG(4,89,3) = 0
-    DEG(4,89,4) = 0
-    DEG(4,89,5) = 0
-    DEG(4,89,6) = 1
-    DEG(4,89,7) = 0
-    DEG(4,89,8) = 2
-    DEG(4,89,9) = 0
-    DEG(4,89,10) = 0
-    DEG(4,89,11) = 0
-    DEG(4,89,12) = 0
-  COEF(4,89) = (-0.18619363019958798, 0)
-    DEG(4,90,1) = 0
-    DEG(4,90,2) = 0
-    DEG(4,90,3) = 1
-    DEG(4,90,4) = 0
-    DEG(4,90,5) = 0
-    DEG(4,90,6) = 1
-    DEG(4,90,7) = 0
-    DEG(4,90,8) = 2
-    DEG(4,90,9) = 0
-    DEG(4,90,10) = 0
-    DEG(4,90,11) = 0
-    DEG(4,90,12) = 0
-  COEF(4,90) = (-0.10708727572876989, 0)
-    DEG(4,91,1) = 0
-    DEG(4,91,2) = 0
-    DEG(4,91,3) = 0
-    DEG(4,91,4) = 1
-    DEG(4,91,5) = 0
-    DEG(4,91,6) = 1
-    DEG(4,91,7) = 0
-    DEG(4,91,8) = 2
-    DEG(4,91,9) = 0
-    DEG(4,91,10) = 0
-    DEG(4,91,11) = 0
-    DEG(4,91,12) = 0
-  COEF(4,91) = (0.10667044925375369, 0)
-    DEG(4,92,1) = 0
-    DEG(4,92,2) = 0
-    DEG(4,92,3) = 0
-    DEG(4,92,4) = 0
-    DEG(4,92,5) = 1
-    DEG(4,92,6) = 1
-    DEG(4,92,7) = 0
-    DEG(4,92,8) = 2
-    DEG(4,92,9) = 0
-    DEG(4,92,10) = 0
-    DEG(4,92,11) = 0
-    DEG(4,92,12) = 0
-  COEF(4,92) = (0.18619363019958798, 0)
-    DEG(4,93,1) = 0
-    DEG(4,93,2) = 0
-    DEG(4,93,3) = 0
-    DEG(4,93,4) = 0
-    DEG(4,93,5) = 0
-    DEG(4,93,6) = 2
-    DEG(4,93,7) = 0
-    DEG(4,93,8) = 2
-    DEG(4,93,9) = 0
-    DEG(4,93,10) = 0
-    DEG(4,93,11) = 0
-    DEG(4,93,12) = 0
-  COEF(4,93) = (0.053543637864384944, 0)
-    DEG(4,94,1) = 0
-    DEG(4,94,2) = 0
-    DEG(4,94,3) = 0
-    DEG(4,94,4) = 0
-    DEG(4,94,5) = 0
-    DEG(4,94,6) = 0
-    DEG(4,94,7) = 0
-    DEG(4,94,8) = 0
-    DEG(4,94,9) = 1
-    DEG(4,94,10) = 0
-    DEG(4,94,11) = 0
-    DEG(4,94,12) = 0
-  COEF(4,94) = (-0.8537222819677254, 0)
-    DEG(4,95,1) = 1
-    DEG(4,95,2) = 0
-    DEG(4,95,3) = 0
-    DEG(4,95,4) = 1
-    DEG(4,95,5) = 0
-    DEG(4,95,6) = 0
-    DEG(4,95,7) = 0
-    DEG(4,95,8) = 0
-    DEG(4,95,9) = 1
-    DEG(4,95,10) = 0
-    DEG(4,95,11) = 0
-    DEG(4,95,12) = 0
-  COEF(4,95) = (1.7747036514792747, 0)
-    DEG(4,96,1) = 0
-    DEG(4,96,2) = 1
-    DEG(4,96,3) = 0
-    DEG(4,96,4) = 1
-    DEG(4,96,5) = 0
-    DEG(4,96,6) = 0
-    DEG(4,96,7) = 0
-    DEG(4,96,8) = 0
-    DEG(4,96,9) = 1
-    DEG(4,96,10) = 0
-    DEG(4,96,11) = 0
-    DEG(4,96,12) = 0
-  COEF(4,96) = (-1.7989000867957197, 0)
-    DEG(4,97,1) = 0
-    DEG(4,97,2) = 0
-    DEG(4,97,3) = 1
-    DEG(4,97,4) = 1
-    DEG(4,97,5) = 0
-    DEG(4,97,6) = 0
-    DEG(4,97,7) = 0
-    DEG(4,97,8) = 0
-    DEG(4,97,9) = 1
-    DEG(4,97,10) = 0
-    DEG(4,97,11) = 0
-    DEG(4,97,12) = 0
-  COEF(4,97) = (-0.35534051472067574, 0)
-    DEG(4,98,1) = 0
-    DEG(4,98,2) = 0
-    DEG(4,98,3) = 0
-    DEG(4,98,4) = 2
-    DEG(4,98,5) = 0
-    DEG(4,98,6) = 0
-    DEG(4,98,7) = 0
-    DEG(4,98,8) = 0
-    DEG(4,98,9) = 1
-    DEG(4,98,10) = 0
-    DEG(4,98,11) = 0
-    DEG(4,98,12) = 0
-  COEF(4,98) = (-0.8873518257396373, 0)
-    DEG(4,99,1) = 1
-    DEG(4,99,2) = 0
-    DEG(4,99,3) = 0
-    DEG(4,99,4) = 0
-    DEG(4,99,5) = 1
-    DEG(4,99,6) = 0
-    DEG(4,99,7) = 0
-    DEG(4,99,8) = 0
-    DEG(4,99,9) = 1
-    DEG(4,99,10) = 0
-    DEG(4,99,11) = 0
-    DEG(4,99,12) = 0
-  COEF(4,99) = (-1.7989000867957197, 0)
-    DEG(4,100,1) = 0
-    DEG(4,100,2) = 1
-    DEG(4,100,3) = 0
-    DEG(4,100,4) = 0
-    DEG(4,100,5) = 1
-    DEG(4,100,6) = 0
-    DEG(4,100,7) = 0
-    DEG(4,100,8) = 0
-    DEG(4,100,9) = 1
-    DEG(4,100,10) = 0
-    DEG(4,100,11) = 0
-    DEG(4,100,12) = 0
-  COEF(4,100) = (-0.9494994564129251, 0)
-    DEG(4,101,1) = 0
-    DEG(4,101,2) = 0
-    DEG(4,101,3) = 1
-    DEG(4,101,4) = 0
-    DEG(4,101,5) = 1
-    DEG(4,101,6) = 0
-    DEG(4,101,7) = 0
-    DEG(4,101,8) = 0
-    DEG(4,101,9) = 1
-    DEG(4,101,10) = 0
-    DEG(4,101,11) = 0
-    DEG(4,101,12) = 0
-  COEF(4,101) = (1.742972030218693, 0)
-    DEG(4,102,1) = 0
-    DEG(4,102,2) = 0
-    DEG(4,102,3) = 0
-    DEG(4,102,4) = 1
-    DEG(4,102,5) = 1
-    DEG(4,102,6) = 0
-    DEG(4,102,7) = 0
-    DEG(4,102,8) = 0
-    DEG(4,102,9) = 1
-    DEG(4,102,10) = 0
-    DEG(4,102,11) = 0
-    DEG(4,102,12) = 0
-  COEF(4,102) = (1.7989000867957197, 0)
-    DEG(4,103,1) = 0
-    DEG(4,103,2) = 0
-    DEG(4,103,3) = 0
-    DEG(4,103,4) = 0
-    DEG(4,103,5) = 2
-    DEG(4,103,6) = 0
-    DEG(4,103,7) = 0
-    DEG(4,103,8) = 0
-    DEG(4,103,9) = 1
-    DEG(4,103,10) = 0
-    DEG(4,103,11) = 0
-    DEG(4,103,12) = 0
-  COEF(4,103) = (0.47474972820646255, 0)
-    DEG(4,104,1) = 1
-    DEG(4,104,2) = 0
-    DEG(4,104,3) = 0
-    DEG(4,104,4) = 0
-    DEG(4,104,5) = 0
-    DEG(4,104,6) = 1
-    DEG(4,104,7) = 0
-    DEG(4,104,8) = 0
-    DEG(4,104,9) = 1
-    DEG(4,104,10) = 0
-    DEG(4,104,11) = 0
-    DEG(4,104,12) = 0
-  COEF(4,104) = (-0.35534051472067574, 0)
-    DEG(4,105,1) = 0
-    DEG(4,105,2) = 1
-    DEG(4,105,3) = 0
-    DEG(4,105,4) = 0
-    DEG(4,105,5) = 0
-    DEG(4,105,6) = 1
-    DEG(4,105,7) = 0
-    DEG(4,105,8) = 0
-    DEG(4,105,9) = 1
-    DEG(4,105,10) = 0
-    DEG(4,105,11) = 0
-    DEG(4,105,12) = 0
-  COEF(4,105) = (1.742972030218693, 0)
-    DEG(4,106,1) = 0
-    DEG(4,106,2) = 0
-    DEG(4,106,3) = 1
-    DEG(4,106,4) = 0
-    DEG(4,106,5) = 0
-    DEG(4,106,6) = 1
-    DEG(4,106,7) = 0
-    DEG(4,106,8) = 0
-    DEG(4,106,9) = 1
-    DEG(4,106,10) = 0
-    DEG(4,106,11) = 0
-    DEG(4,106,12) = 0
-  COEF(4,106) = (0.8822403688691011, 0)
-    DEG(4,107,1) = 0
-    DEG(4,107,2) = 0
-    DEG(4,107,3) = 0
-    DEG(4,107,4) = 1
-    DEG(4,107,5) = 0
-    DEG(4,107,6) = 1
-    DEG(4,107,7) = 0
-    DEG(4,107,8) = 0
-    DEG(4,107,9) = 1
-    DEG(4,107,10) = 0
-    DEG(4,107,11) = 0
-    DEG(4,107,12) = 0
-  COEF(4,107) = (0.35534051472067574, 0)
-    DEG(4,108,1) = 0
-    DEG(4,108,2) = 0
-    DEG(4,108,3) = 0
-    DEG(4,108,4) = 0
-    DEG(4,108,5) = 1
-    DEG(4,108,6) = 1
-    DEG(4,108,7) = 0
-    DEG(4,108,8) = 0
-    DEG(4,108,9) = 1
-    DEG(4,108,10) = 0
-    DEG(4,108,11) = 0
-    DEG(4,108,12) = 0
-  COEF(4,108) = (-1.742972030218693, 0)
-    DEG(4,109,1) = 0
-    DEG(4,109,2) = 0
-    DEG(4,109,3) = 0
-    DEG(4,109,4) = 0
-    DEG(4,109,5) = 0
-    DEG(4,109,6) = 2
-    DEG(4,109,7) = 0
-    DEG(4,109,8) = 0
-    DEG(4,109,9) = 1
-    DEG(4,109,10) = 0
-    DEG(4,109,11) = 0
-    DEG(4,109,12) = 0
-  COEF(4,109) = (-0.44112018443455053, 0)
-    DEG(4,110,1) = 1
-    DEG(4,110,2) = 0
-    DEG(4,110,3) = 0
-    DEG(4,110,4) = 1
-    DEG(4,110,5) = 0
-    DEG(4,110,6) = 0
-    DEG(4,110,7) = 1
-    DEG(4,110,8) = 0
-    DEG(4,110,9) = 1
-    DEG(4,110,10) = 0
-    DEG(4,110,11) = 0
-    DEG(4,110,12) = 0
-  COEF(4,110) = (2.7525028517445373, 0)
-    DEG(4,111,1) = 0
-    DEG(4,111,2) = 1
-    DEG(4,111,3) = 0
-    DEG(4,111,4) = 1
-    DEG(4,111,5) = 0
-    DEG(4,111,6) = 0
-    DEG(4,111,7) = 1
-    DEG(4,111,8) = 0
-    DEG(4,111,9) = 1
-    DEG(4,111,10) = 0
-    DEG(4,111,11) = 0
-    DEG(4,111,12) = 0
-  COEF(4,111) = (0.586117923017187, 0)
-    DEG(4,112,1) = 0
-    DEG(4,112,2) = 0
-    DEG(4,112,3) = 1
-    DEG(4,112,4) = 1
-    DEG(4,112,5) = 0
-    DEG(4,112,6) = 0
-    DEG(4,112,7) = 1
-    DEG(4,112,8) = 0
-    DEG(4,112,9) = 1
-    DEG(4,112,10) = 0
-    DEG(4,112,11) = 0
-    DEG(4,112,12) = 0
-  COEF(4,112) = (-0.5119370165908451, 0)
-    DEG(4,113,1) = 0
-    DEG(4,113,2) = 0
-    DEG(4,113,3) = 0
-    DEG(4,113,4) = 2
-    DEG(4,113,5) = 0
-    DEG(4,113,6) = 0
-    DEG(4,113,7) = 1
-    DEG(4,113,8) = 0
-    DEG(4,113,9) = 1
-    DEG(4,113,10) = 0
-    DEG(4,113,11) = 0
-    DEG(4,113,12) = 0
-  COEF(4,113) = (-1.3762514258722687, 0)
-    DEG(4,114,1) = 1
-    DEG(4,114,2) = 0
-    DEG(4,114,3) = 0
-    DEG(4,114,4) = 0
-    DEG(4,114,5) = 1
-    DEG(4,114,6) = 0
-    DEG(4,114,7) = 1
-    DEG(4,114,8) = 0
-    DEG(4,114,9) = 1
-    DEG(4,114,10) = 0
-    DEG(4,114,11) = 0
-    DEG(4,114,12) = 0
-  COEF(4,114) = (0.586117923017187, 0)
-    DEG(4,115,1) = 0
-    DEG(4,115,2) = 1
-    DEG(4,115,3) = 0
-    DEG(4,115,4) = 0
-    DEG(4,115,5) = 1
-    DEG(4,115,6) = 0
-    DEG(4,115,7) = 1
-    DEG(4,115,8) = 0
-    DEG(4,115,9) = 1
-    DEG(4,115,10) = 0
-    DEG(4,115,11) = 0
-    DEG(4,115,12) = 0
-  COEF(4,115) = (-2.4544226856751155, 0)
-    DEG(4,116,1) = 0
-    DEG(4,116,2) = 0
-    DEG(4,116,3) = 1
-    DEG(4,116,4) = 0
-    DEG(4,116,5) = 1
-    DEG(4,116,6) = 0
-    DEG(4,116,7) = 1
-    DEG(4,116,8) = 0
-    DEG(4,116,9) = 1
-    DEG(4,116,10) = 0
-    DEG(4,116,11) = 0
-    DEG(4,116,12) = 0
-  COEF(4,116) = (-1.0979106848593718, 0)
-    DEG(4,117,1) = 0
-    DEG(4,117,2) = 0
-    DEG(4,117,3) = 0
-    DEG(4,117,4) = 1
-    DEG(4,117,5) = 1
-    DEG(4,117,6) = 0
-    DEG(4,117,7) = 1
-    DEG(4,117,8) = 0
-    DEG(4,117,9) = 1
-    DEG(4,117,10) = 0
-    DEG(4,117,11) = 0
-    DEG(4,117,12) = 0
-  COEF(4,117) = (-0.586117923017187, 0)
-    DEG(4,118,1) = 0
-    DEG(4,118,2) = 0
-    DEG(4,118,3) = 0
-    DEG(4,118,4) = 0
-    DEG(4,118,5) = 2
-    DEG(4,118,6) = 0
-    DEG(4,118,7) = 1
-    DEG(4,118,8) = 0
-    DEG(4,118,9) = 1
-    DEG(4,118,10) = 0
-    DEG(4,118,11) = 0
-    DEG(4,118,12) = 0
-  COEF(4,118) = (1.2272113428375577, 0)
-    DEG(4,119,1) = 1
-    DEG(4,119,2) = 0
-    DEG(4,119,3) = 0
-    DEG(4,119,4) = 0
-    DEG(4,119,5) = 0
-    DEG(4,119,6) = 1
-    DEG(4,119,7) = 1
-    DEG(4,119,8) = 0
-    DEG(4,119,9) = 1
-    DEG(4,119,10) = 0
-    DEG(4,119,11) = 0
-    DEG(4,119,12) = 0
-  COEF(4,119) = (-0.5119370165908451, 0)
-    DEG(4,120,1) = 0
-    DEG(4,120,2) = 1
-    DEG(4,120,3) = 0
-    DEG(4,120,4) = 0
-    DEG(4,120,5) = 0
-    DEG(4,120,6) = 1
-    DEG(4,120,7) = 1
-    DEG(4,120,8) = 0
-    DEG(4,120,9) = 1
-    DEG(4,120,10) = 0
-    DEG(4,120,11) = 0
-    DEG(4,120,12) = 0
-  COEF(4,120) = (-1.0979106848593718, 0)
-    DEG(4,121,1) = 0
-    DEG(4,121,2) = 0
-    DEG(4,121,3) = 1
-    DEG(4,121,4) = 0
-    DEG(4,121,5) = 0
-    DEG(4,121,6) = 1
-    DEG(4,121,7) = 1
-    DEG(4,121,8) = 0
-    DEG(4,121,9) = 1
-    DEG(4,121,10) = 0
-    DEG(4,121,11) = 0
-    DEG(4,121,12) = 0
-  COEF(4,121) = (-0.2980801660694222, 0)
-    DEG(4,122,1) = 0
-    DEG(4,122,2) = 0
-    DEG(4,122,3) = 0
-    DEG(4,122,4) = 1
-    DEG(4,122,5) = 0
-    DEG(4,122,6) = 1
-    DEG(4,122,7) = 1
-    DEG(4,122,8) = 0
-    DEG(4,122,9) = 1
-    DEG(4,122,10) = 0
-    DEG(4,122,11) = 0
-    DEG(4,122,12) = 0
-  COEF(4,122) = (0.5119370165908451, 0)
-    DEG(4,123,1) = 0
-    DEG(4,123,2) = 0
-    DEG(4,123,3) = 0
-    DEG(4,123,4) = 0
-    DEG(4,123,5) = 1
-    DEG(4,123,6) = 1
-    DEG(4,123,7) = 1
-    DEG(4,123,8) = 0
-    DEG(4,123,9) = 1
-    DEG(4,123,10) = 0
-    DEG(4,123,11) = 0
-    DEG(4,123,12) = 0
-  COEF(4,123) = (1.0979106848593718, 0)
-    DEG(4,124,1) = 0
-    DEG(4,124,2) = 0
-    DEG(4,124,3) = 0
-    DEG(4,124,4) = 0
-    DEG(4,124,5) = 0
-    DEG(4,124,6) = 2
-    DEG(4,124,7) = 1
-    DEG(4,124,8) = 0
-    DEG(4,124,9) = 1
-    DEG(4,124,10) = 0
-    DEG(4,124,11) = 0
-    DEG(4,124,12) = 0
-  COEF(4,124) = (0.1490400830347111, 0)
-    DEG(4,125,1) = 1
-    DEG(4,125,2) = 0
-    DEG(4,125,3) = 0
-    DEG(4,125,4) = 1
-    DEG(4,125,5) = 0
-    DEG(4,125,6) = 0
-    DEG(4,125,7) = 0
-    DEG(4,125,8) = 1
-    DEG(4,125,9) = 1
-    DEG(4,125,10) = 0
-    DEG(4,125,11) = 0
-    DEG(4,125,12) = 0
-  COEF(4,125) = (0.019512026587900935, 0)
-    DEG(4,126,1) = 0
-    DEG(4,126,2) = 1
-    DEG(4,126,3) = 0
-    DEG(4,126,4) = 1
-    DEG(4,126,5) = 0
-    DEG(4,126,6) = 0
-    DEG(4,126,7) = 0
-    DEG(4,126,8) = 1
-    DEG(4,126,9) = 1
-    DEG(4,126,10) = 0
-    DEG(4,126,11) = 0
-    DEG(4,126,12) = 0
-  COEF(4,126) = (-0.8315235961437495, 0)
-    DEG(4,127,1) = 0
-    DEG(4,127,2) = 0
-    DEG(4,127,3) = 1
-    DEG(4,127,4) = 1
-    DEG(4,127,5) = 0
-    DEG(4,127,6) = 0
-    DEG(4,127,7) = 0
-    DEG(4,127,8) = 1
-    DEG(4,127,9) = 1
-    DEG(4,127,10) = 0
-    DEG(4,127,11) = 0
-    DEG(4,127,12) = 0
-  COEF(4,127) = (-0.00397498519120059, 0)
-    DEG(4,128,1) = 0
-    DEG(4,128,2) = 0
-    DEG(4,128,3) = 0
-    DEG(4,128,4) = 2
-    DEG(4,128,5) = 0
-    DEG(4,128,6) = 0
-    DEG(4,128,7) = 0
-    DEG(4,128,8) = 1
-    DEG(4,128,9) = 1
-    DEG(4,128,10) = 0
-    DEG(4,128,11) = 0
-    DEG(4,128,12) = 0
-  COEF(4,128) = (-0.009756013293950467, 0)
-    DEG(4,129,1) = 1
-    DEG(4,129,2) = 0
-    DEG(4,129,3) = 0
-    DEG(4,129,4) = 0
-    DEG(4,129,5) = 1
-    DEG(4,129,6) = 0
-    DEG(4,129,7) = 0
-    DEG(4,129,8) = 1
-    DEG(4,129,9) = 1
-    DEG(4,129,10) = 0
-    DEG(4,129,11) = 0
-    DEG(4,129,12) = 0
-  COEF(4,129) = (-0.8315235961437495, 0)
-    DEG(4,130,1) = 0
-    DEG(4,130,2) = 1
-    DEG(4,130,3) = 0
-    DEG(4,130,4) = 0
-    DEG(4,130,5) = 1
-    DEG(4,130,6) = 0
-    DEG(4,130,7) = 0
-    DEG(4,130,8) = 1
-    DEG(4,130,9) = 1
-    DEG(4,130,10) = 0
-    DEG(4,130,11) = 0
-    DEG(4,130,12) = 0
-  COEF(4,130) = (2.2322308992104913, 0)
-    DEG(4,131,1) = 0
-    DEG(4,131,2) = 0
-    DEG(4,131,3) = 1
-    DEG(4,131,4) = 0
-    DEG(4,131,5) = 1
-    DEG(4,131,6) = 0
-    DEG(4,131,7) = 0
-    DEG(4,131,8) = 1
-    DEG(4,131,9) = 1
-    DEG(4,131,10) = 0
-    DEG(4,131,11) = 0
-    DEG(4,131,12) = 0
-  COEF(4,131) = (-2.7461649961434147, 0)
-    DEG(4,132,1) = 0
-    DEG(4,132,2) = 0
-    DEG(4,132,3) = 0
-    DEG(4,132,4) = 1
-    DEG(4,132,5) = 1
-    DEG(4,132,6) = 0
-    DEG(4,132,7) = 0
-    DEG(4,132,8) = 1
-    DEG(4,132,9) = 1
-    DEG(4,132,10) = 0
-    DEG(4,132,11) = 0
-    DEG(4,132,12) = 0
-  COEF(4,132) = (0.8315235961437495, 0)
-    DEG(4,133,1) = 0
-    DEG(4,133,2) = 0
-    DEG(4,133,3) = 0
-    DEG(4,133,4) = 0
-    DEG(4,133,5) = 2
-    DEG(4,133,6) = 0
-    DEG(4,133,7) = 0
-    DEG(4,133,8) = 1
-    DEG(4,133,9) = 1
-    DEG(4,133,10) = 0
-    DEG(4,133,11) = 0
-    DEG(4,133,12) = 0
-  COEF(4,133) = (-1.1161154496052457, 0)
-    DEG(4,134,1) = 1
-    DEG(4,134,2) = 0
-    DEG(4,134,3) = 0
-    DEG(4,134,4) = 0
-    DEG(4,134,5) = 0
-    DEG(4,134,6) = 1
-    DEG(4,134,7) = 0
-    DEG(4,134,8) = 1
-    DEG(4,134,9) = 1
-    DEG(4,134,10) = 0
-    DEG(4,134,11) = 0
-    DEG(4,134,12) = 0
-  COEF(4,134) = (-0.00397498519120059, 0)
-    DEG(4,135,1) = 0
-    DEG(4,135,2) = 1
-    DEG(4,135,3) = 0
-    DEG(4,135,4) = 0
-    DEG(4,135,5) = 0
-    DEG(4,135,6) = 1
-    DEG(4,135,7) = 0
-    DEG(4,135,8) = 1
-    DEG(4,135,9) = 1
-    DEG(4,135,10) = 0
-    DEG(4,135,11) = 0
-    DEG(4,135,12) = 0
-  COEF(4,135) = (-2.7461649961434147, 0)
-    DEG(4,136,1) = 0
-    DEG(4,136,2) = 0
-    DEG(4,136,3) = 1
-    DEG(4,136,4) = 0
-    DEG(4,136,5) = 0
-    DEG(4,136,6) = 1
-    DEG(4,136,7) = 0
-    DEG(4,136,8) = 1
-    DEG(4,136,9) = 1
-    DEG(4,136,10) = 0
-    DEG(4,136,11) = 0
-    DEG(4,136,12) = 0
-  COEF(4,136) = (-2.2517429257983923, 0)
-    DEG(4,137,1) = 0
-    DEG(4,137,2) = 0
-    DEG(4,137,3) = 0
-    DEG(4,137,4) = 1
-    DEG(4,137,5) = 0
-    DEG(4,137,6) = 1
-    DEG(4,137,7) = 0
-    DEG(4,137,8) = 1
-    DEG(4,137,9) = 1
-    DEG(4,137,10) = 0
-    DEG(4,137,11) = 0
-    DEG(4,137,12) = 0
-  COEF(4,137) = (0.00397498519120059, 0)
-    DEG(4,138,1) = 0
-    DEG(4,138,2) = 0
-    DEG(4,138,3) = 0
-    DEG(4,138,4) = 0
-    DEG(4,138,5) = 1
-    DEG(4,138,6) = 1
-    DEG(4,138,7) = 0
-    DEG(4,138,8) = 1
-    DEG(4,138,9) = 1
-    DEG(4,138,10) = 0
-    DEG(4,138,11) = 0
-    DEG(4,138,12) = 0
-  COEF(4,138) = (2.7461649961434147, 0)
-    DEG(4,139,1) = 0
-    DEG(4,139,2) = 0
-    DEG(4,139,3) = 0
-    DEG(4,139,4) = 0
-    DEG(4,139,5) = 0
-    DEG(4,139,6) = 2
-    DEG(4,139,7) = 0
-    DEG(4,139,8) = 1
-    DEG(4,139,9) = 1
-    DEG(4,139,10) = 0
-    DEG(4,139,11) = 0
-    DEG(4,139,12) = 0
-  COEF(4,139) = (1.1258714628991962, 0)
-    DEG(4,140,1) = 1
-    DEG(4,140,2) = 0
-    DEG(4,140,3) = 0
-    DEG(4,140,4) = 1
-    DEG(4,140,5) = 0
-    DEG(4,140,6) = 0
-    DEG(4,140,7) = 0
-    DEG(4,140,8) = 0
-    DEG(4,140,9) = 2
-    DEG(4,140,10) = 0
-    DEG(4,140,11) = 0
-    DEG(4,140,12) = 0
-  COEF(4,140) = (0.19975959291642092, 0)
-    DEG(4,141,1) = 0
-    DEG(4,141,2) = 1
-    DEG(4,141,3) = 0
-    DEG(4,141,4) = 1
-    DEG(4,141,5) = 0
-    DEG(4,141,6) = 0
-    DEG(4,141,7) = 0
-    DEG(4,141,8) = 0
-    DEG(4,141,9) = 2
-    DEG(4,141,10) = 0
-    DEG(4,141,11) = 0
-    DEG(4,141,12) = 0
-  COEF(4,141) = (-1.3002860888328447, 0)
-    DEG(4,142,1) = 0
-    DEG(4,142,2) = 0
-    DEG(4,142,3) = 1
-    DEG(4,142,4) = 1
-    DEG(4,142,5) = 0
-    DEG(4,142,6) = 0
-    DEG(4,142,7) = 0
-    DEG(4,142,8) = 0
-    DEG(4,142,9) = 2
-    DEG(4,142,10) = 0
-    DEG(4,142,11) = 0
-    DEG(4,142,12) = 0
-  COEF(4,142) = (-0.49919002639497523, 0)
-    DEG(4,143,1) = 0
-    DEG(4,143,2) = 0
-    DEG(4,143,3) = 0
-    DEG(4,143,4) = 2
-    DEG(4,143,5) = 0
-    DEG(4,143,6) = 0
-    DEG(4,143,7) = 0
-    DEG(4,143,8) = 0
-    DEG(4,143,9) = 2
-    DEG(4,143,10) = 0
-    DEG(4,143,11) = 0
-    DEG(4,143,12) = 0
-  COEF(4,143) = (-0.09987979645821046, 0)
-    DEG(4,144,1) = 1
-    DEG(4,144,2) = 0
-    DEG(4,144,3) = 0
-    DEG(4,144,4) = 0
-    DEG(4,144,5) = 1
-    DEG(4,144,6) = 0
-    DEG(4,144,7) = 0
-    DEG(4,144,8) = 0
-    DEG(4,144,9) = 2
-    DEG(4,144,10) = 0
-    DEG(4,144,11) = 0
-    DEG(4,144,12) = 0
-  COEF(4,144) = (-1.3002860888328447, 0)
-    DEG(4,145,1) = 0
-    DEG(4,145,2) = 1
-    DEG(4,145,3) = 0
-    DEG(4,145,4) = 0
-    DEG(4,145,5) = 1
-    DEG(4,145,6) = 0
-    DEG(4,145,7) = 0
-    DEG(4,145,8) = 0
-    DEG(4,145,9) = 2
-    DEG(4,145,10) = 0
-    DEG(4,145,11) = 0
-    DEG(4,145,12) = 0
-  COEF(4,145) = (-0.46847705713615223, 0)
-    DEG(4,146,1) = 0
-    DEG(4,146,2) = 0
-    DEG(4,146,3) = 1
-    DEG(4,146,4) = 0
-    DEG(4,146,5) = 1
-    DEG(4,146,6) = 0
-    DEG(4,146,7) = 0
-    DEG(4,146,8) = 0
-    DEG(4,146,9) = 2
-    DEG(4,146,10) = 0
-    DEG(4,146,11) = 0
-    DEG(4,146,12) = 0
-  COEF(4,146) = (0.29259544516724945, 0)
-    DEG(4,147,1) = 0
-    DEG(4,147,2) = 0
-    DEG(4,147,3) = 0
-    DEG(4,147,4) = 1
-    DEG(4,147,5) = 1
-    DEG(4,147,6) = 0
-    DEG(4,147,7) = 0
-    DEG(4,147,8) = 0
-    DEG(4,147,9) = 2
-    DEG(4,147,10) = 0
-    DEG(4,147,11) = 0
-    DEG(4,147,12) = 0
-  COEF(4,147) = (1.3002860888328447, 0)
-    DEG(4,148,1) = 0
-    DEG(4,148,2) = 0
-    DEG(4,148,3) = 0
-    DEG(4,148,4) = 0
-    DEG(4,148,5) = 2
-    DEG(4,148,6) = 0
-    DEG(4,148,7) = 0
-    DEG(4,148,8) = 0
-    DEG(4,148,9) = 2
-    DEG(4,148,10) = 0
-    DEG(4,148,11) = 0
-    DEG(4,148,12) = 0
-  COEF(4,148) = (0.23423852856807612, 0)
-    DEG(4,149,1) = 1
-    DEG(4,149,2) = 0
-    DEG(4,149,3) = 0
-    DEG(4,149,4) = 0
-    DEG(4,149,5) = 0
-    DEG(4,149,6) = 1
-    DEG(4,149,7) = 0
-    DEG(4,149,8) = 0
-    DEG(4,149,9) = 2
-    DEG(4,149,10) = 0
-    DEG(4,149,11) = 0
-    DEG(4,149,12) = 0
-  COEF(4,149) = (-0.49919002639497523, 0)
-    DEG(4,150,1) = 0
-    DEG(4,150,2) = 1
-    DEG(4,150,3) = 0
-    DEG(4,150,4) = 0
-    DEG(4,150,5) = 0
-    DEG(4,150,6) = 1
-    DEG(4,150,7) = 0
-    DEG(4,150,8) = 0
-    DEG(4,150,9) = 2
-    DEG(4,150,10) = 0
-    DEG(4,150,11) = 0
-    DEG(4,150,12) = 0
-  COEF(4,150) = (0.29259544516724945, 0)
-    DEG(4,151,1) = 0
-    DEG(4,151,2) = 0
-    DEG(4,151,3) = 1
-    DEG(4,151,4) = 0
-    DEG(4,151,5) = 0
-    DEG(4,151,6) = 1
-    DEG(4,151,7) = 0
-    DEG(4,151,8) = 0
-    DEG(4,151,9) = 2
-    DEG(4,151,10) = 0
-    DEG(4,151,11) = 0
-    DEG(4,151,12) = 0
-  COEF(4,151) = (0.2687174642197313, 0)
-    DEG(4,152,1) = 0
-    DEG(4,152,2) = 0
-    DEG(4,152,3) = 0
-    DEG(4,152,4) = 1
-    DEG(4,152,5) = 0
-    DEG(4,152,6) = 1
-    DEG(4,152,7) = 0
-    DEG(4,152,8) = 0
-    DEG(4,152,9) = 2
-    DEG(4,152,10) = 0
-    DEG(4,152,11) = 0
-    DEG(4,152,12) = 0
-  COEF(4,152) = (0.49919002639497523, 0)
-    DEG(4,153,1) = 0
-    DEG(4,153,2) = 0
-    DEG(4,153,3) = 0
-    DEG(4,153,4) = 0
-    DEG(4,153,5) = 1
-    DEG(4,153,6) = 1
-    DEG(4,153,7) = 0
-    DEG(4,153,8) = 0
-    DEG(4,153,9) = 2
-    DEG(4,153,10) = 0
-    DEG(4,153,11) = 0
-    DEG(4,153,12) = 0
-  COEF(4,153) = (-0.29259544516724945, 0)
-    DEG(4,154,1) = 0
-    DEG(4,154,2) = 0
-    DEG(4,154,3) = 0
-    DEG(4,154,4) = 0
-    DEG(4,154,5) = 0
-    DEG(4,154,6) = 2
-    DEG(4,154,7) = 0
-    DEG(4,154,8) = 0
-    DEG(4,154,9) = 2
-    DEG(4,154,10) = 0
-    DEG(4,154,11) = 0
-    DEG(4,154,12) = 0
-  COEF(4,154) = (-0.13435873210986565, 0)
-    DEG(4,155,1) = 0
-    DEG(4,155,2) = 0
-    DEG(4,155,3) = 0
-    DEG(4,155,4) = 0
-    DEG(4,155,5) = 0
-    DEG(4,155,6) = 0
-    DEG(4,155,7) = 0
-    DEG(4,155,8) = 0
-    DEG(4,155,9) = 0
-    DEG(4,155,10) = 1
-    DEG(4,155,11) = 0
-    DEG(4,155,12) = 0
-  COEF(4,155) = (-1.9748956866392908, 0)
-    DEG(4,156,1) = 1
-    DEG(4,156,2) = 0
-    DEG(4,156,3) = 0
-    DEG(4,156,4) = 1
-    DEG(4,156,5) = 0
-    DEG(4,156,6) = 0
-    DEG(4,156,7) = 0
-    DEG(4,156,8) = 0
-    DEG(4,156,9) = 0
-    DEG(4,156,10) = 1
-    DEG(4,156,11) = 0
-    DEG(4,156,12) = 0
-  COEF(4,156) = (1.9748956866392908, 0)
-    DEG(4,157,1) = 1
-    DEG(4,157,2) = 0
-    DEG(4,157,3) = 0
-    DEG(4,157,4) = 0
-    DEG(4,157,5) = 1
-    DEG(4,157,6) = 0
-    DEG(4,157,7) = 0
-    DEG(4,157,8) = 0
-    DEG(4,157,9) = 0
-    DEG(4,157,10) = 1
-    DEG(4,157,11) = 0
-    DEG(4,157,12) = 0
-  COEF(4,157) = (-0.6605037584056619, 0)
-    DEG(4,158,1) = 1
-    DEG(4,158,2) = 0
-    DEG(4,158,3) = 0
-    DEG(4,158,4) = 0
-    DEG(4,158,5) = 0
-    DEG(4,158,6) = 1
-    DEG(4,158,7) = 0
-    DEG(4,158,8) = 0
-    DEG(4,158,9) = 0
-    DEG(4,158,10) = 1
-    DEG(4,158,11) = 0
-    DEG(4,158,12) = 0
-  COEF(4,158) = (1.5710537578152084, 0)
-    DEG(4,159,1) = 0
-    DEG(4,159,2) = 0
-    DEG(4,159,3) = 0
-    DEG(4,159,4) = 0
-    DEG(4,159,5) = 0
-    DEG(4,159,6) = 0
-    DEG(4,159,7) = 1
-    DEG(4,159,8) = 0
-    DEG(4,159,9) = 0
-    DEG(4,159,10) = 1
-    DEG(4,159,11) = 0
-    DEG(4,159,12) = 0
-  COEF(4,159) = (-3.6028650897534913, 0)
-    DEG(4,160,1) = 1
-    DEG(4,160,2) = 0
-    DEG(4,160,3) = 0
-    DEG(4,160,4) = 1
-    DEG(4,160,5) = 0
-    DEG(4,160,6) = 0
-    DEG(4,160,7) = 1
-    DEG(4,160,8) = 0
-    DEG(4,160,9) = 0
-    DEG(4,160,10) = 1
-    DEG(4,160,11) = 0
-    DEG(4,160,12) = 0
-  COEF(4,160) = (3.6028650897534913, 0)
-    DEG(4,161,1) = 1
-    DEG(4,161,2) = 0
-    DEG(4,161,3) = 0
-    DEG(4,161,4) = 0
-    DEG(4,161,5) = 1
-    DEG(4,161,6) = 0
-    DEG(4,161,7) = 1
-    DEG(4,161,8) = 0
-    DEG(4,161,9) = 0
-    DEG(4,161,10) = 1
-    DEG(4,161,11) = 0
-    DEG(4,161,12) = 0
-  COEF(4,161) = (0.4399827278441305, 0)
-    DEG(4,162,1) = 1
-    DEG(4,162,2) = 0
-    DEG(4,162,3) = 0
-    DEG(4,162,4) = 0
-    DEG(4,162,5) = 0
-    DEG(4,162,6) = 1
-    DEG(4,162,7) = 1
-    DEG(4,162,8) = 0
-    DEG(4,162,9) = 0
-    DEG(4,162,10) = 1
-    DEG(4,162,11) = 0
-    DEG(4,162,12) = 0
-  COEF(4,162) = (-0.489378443504812, 0)
-    DEG(4,163,1) = 0
-    DEG(4,163,2) = 0
-    DEG(4,163,3) = 0
-    DEG(4,163,4) = 0
-    DEG(4,163,5) = 0
-    DEG(4,163,6) = 0
-    DEG(4,163,7) = 0
-    DEG(4,163,8) = 1
-    DEG(4,163,9) = 0
-    DEG(4,163,10) = 1
-    DEG(4,163,11) = 0
-    DEG(4,163,12) = 0
-  COEF(4,163) = (0.10364294061438788, 0)
-    DEG(4,164,1) = 1
-    DEG(4,164,2) = 0
-    DEG(4,164,3) = 0
-    DEG(4,164,4) = 1
-    DEG(4,164,5) = 0
-    DEG(4,164,6) = 0
-    DEG(4,164,7) = 0
-    DEG(4,164,8) = 1
-    DEG(4,164,9) = 0
-    DEG(4,164,10) = 1
-    DEG(4,164,11) = 0
-    DEG(4,164,12) = 0
-  COEF(4,164) = (-0.10364294061438788, 0)
-    DEG(4,165,1) = 1
-    DEG(4,165,2) = 0
-    DEG(4,165,3) = 0
-    DEG(4,165,4) = 0
-    DEG(4,165,5) = 1
-    DEG(4,165,6) = 0
-    DEG(4,165,7) = 0
-    DEG(4,165,8) = 1
-    DEG(4,165,9) = 0
-    DEG(4,165,10) = 1
-    DEG(4,165,11) = 0
-    DEG(4,165,12) = 0
-  COEF(4,165) = (-0.2224861364141455, 0)
-    DEG(4,166,1) = 1
-    DEG(4,166,2) = 0
-    DEG(4,166,3) = 0
-    DEG(4,166,4) = 0
-    DEG(4,166,5) = 0
-    DEG(4,166,6) = 1
-    DEG(4,166,7) = 0
-    DEG(4,166,8) = 1
-    DEG(4,166,9) = 0
-    DEG(4,166,10) = 1
-    DEG(4,166,11) = 0
-    DEG(4,166,12) = 0
-  COEF(4,166) = (-0.05802633468698669, 0)
-    DEG(4,167,1) = 0
-    DEG(4,167,2) = 0
-    DEG(4,167,3) = 0
-    DEG(4,167,4) = 0
-    DEG(4,167,5) = 0
-    DEG(4,167,6) = 0
-    DEG(4,167,7) = 0
-    DEG(4,167,8) = 0
-    DEG(4,167,9) = 1
-    DEG(4,167,10) = 1
-    DEG(4,167,11) = 0
-    DEG(4,167,12) = 0
-  COEF(4,167) = (-0.26037743907080846, 0)
-    DEG(4,168,1) = 1
-    DEG(4,168,2) = 0
-    DEG(4,168,3) = 0
-    DEG(4,168,4) = 1
-    DEG(4,168,5) = 0
-    DEG(4,168,6) = 0
-    DEG(4,168,7) = 0
-    DEG(4,168,8) = 0
-    DEG(4,168,9) = 1
-    DEG(4,168,10) = 1
-    DEG(4,168,11) = 0
-    DEG(4,168,12) = 0
-  COEF(4,168) = (0.26037743907080846, 0)
-    DEG(4,169,1) = 1
-    DEG(4,169,2) = 0
-    DEG(4,169,3) = 0
-    DEG(4,169,4) = 0
-    DEG(4,169,5) = 1
-    DEG(4,169,6) = 0
-    DEG(4,169,7) = 0
-    DEG(4,169,8) = 0
-    DEG(4,169,9) = 1
-    DEG(4,169,10) = 1
-    DEG(4,169,11) = 0
-    DEG(4,169,12) = 0
-  COEF(4,169) = (-3.435999891436883, 0)
-    DEG(4,170,1) = 1
-    DEG(4,170,2) = 0
-    DEG(4,170,3) = 0
-    DEG(4,170,4) = 0
-    DEG(4,170,5) = 0
-    DEG(4,170,6) = 1
-    DEG(4,170,7) = 0
-    DEG(4,170,8) = 0
-    DEG(4,170,9) = 1
-    DEG(4,170,10) = 1
-    DEG(4,170,11) = 0
-    DEG(4,170,12) = 0
-  COEF(4,170) = (-1.2270157745253036, 0)
-    DEG(4,171,1) = 0
-    DEG(4,171,2) = 0
-    DEG(4,171,3) = 0
-    DEG(4,171,4) = 0
-    DEG(4,171,5) = 0
-    DEG(4,171,6) = 0
-    DEG(4,171,7) = 0
-    DEG(4,171,8) = 0
-    DEG(4,171,9) = 0
-    DEG(4,171,10) = 0
-    DEG(4,171,11) = 1
-    DEG(4,171,12) = 0
-  COEF(4,171) = (0.6605037584056619, 0)
-    DEG(4,172,1) = 0
-    DEG(4,172,2) = 1
-    DEG(4,172,3) = 0
-    DEG(4,172,4) = 1
-    DEG(4,172,5) = 0
-    DEG(4,172,6) = 0
-    DEG(4,172,7) = 0
-    DEG(4,172,8) = 0
-    DEG(4,172,9) = 0
-    DEG(4,172,10) = 0
-    DEG(4,172,11) = 1
-    DEG(4,172,12) = 0
-  COEF(4,172) = (1.9748956866392908, 0)
-    DEG(4,173,1) = 0
-    DEG(4,173,2) = 1
-    DEG(4,173,3) = 0
-    DEG(4,173,4) = 0
-    DEG(4,173,5) = 1
-    DEG(4,173,6) = 0
-    DEG(4,173,7) = 0
-    DEG(4,173,8) = 0
-    DEG(4,173,9) = 0
-    DEG(4,173,10) = 0
-    DEG(4,173,11) = 1
-    DEG(4,173,12) = 0
-  COEF(4,173) = (-0.6605037584056619, 0)
-    DEG(4,174,1) = 0
-    DEG(4,174,2) = 1
-    DEG(4,174,3) = 0
-    DEG(4,174,4) = 0
-    DEG(4,174,5) = 0
-    DEG(4,174,6) = 1
-    DEG(4,174,7) = 0
-    DEG(4,174,8) = 0
-    DEG(4,174,9) = 0
-    DEG(4,174,10) = 0
-    DEG(4,174,11) = 1
-    DEG(4,174,12) = 0
-  COEF(4,174) = (1.5710537578152084, 0)
-    DEG(4,175,1) = 0
-    DEG(4,175,2) = 0
-    DEG(4,175,3) = 0
-    DEG(4,175,4) = 0
-    DEG(4,175,5) = 0
-    DEG(4,175,6) = 0
-    DEG(4,175,7) = 1
-    DEG(4,175,8) = 0
-    DEG(4,175,9) = 0
-    DEG(4,175,10) = 0
-    DEG(4,175,11) = 1
-    DEG(4,175,12) = 0
-  COEF(4,175) = (-0.4399827278441305, 0)
-    DEG(4,176,1) = 0
-    DEG(4,176,2) = 1
-    DEG(4,176,3) = 0
-    DEG(4,176,4) = 1
-    DEG(4,176,5) = 0
-    DEG(4,176,6) = 0
-    DEG(4,176,7) = 1
-    DEG(4,176,8) = 0
-    DEG(4,176,9) = 0
-    DEG(4,176,10) = 0
-    DEG(4,176,11) = 1
-    DEG(4,176,12) = 0
-  COEF(4,176) = (3.6028650897534913, 0)
-    DEG(4,177,1) = 0
-    DEG(4,177,2) = 1
-    DEG(4,177,3) = 0
-    DEG(4,177,4) = 0
-    DEG(4,177,5) = 1
-    DEG(4,177,6) = 0
-    DEG(4,177,7) = 1
-    DEG(4,177,8) = 0
-    DEG(4,177,9) = 0
-    DEG(4,177,10) = 0
-    DEG(4,177,11) = 1
-    DEG(4,177,12) = 0
-  COEF(4,177) = (0.4399827278441305, 0)
-    DEG(4,178,1) = 0
-    DEG(4,178,2) = 1
-    DEG(4,178,3) = 0
-    DEG(4,178,4) = 0
-    DEG(4,178,5) = 0
-    DEG(4,178,6) = 1
-    DEG(4,178,7) = 1
-    DEG(4,178,8) = 0
-    DEG(4,178,9) = 0
-    DEG(4,178,10) = 0
-    DEG(4,178,11) = 1
-    DEG(4,178,12) = 0
-  COEF(4,178) = (-0.489378443504812, 0)
-    DEG(4,179,1) = 0
-    DEG(4,179,2) = 0
-    DEG(4,179,3) = 0
-    DEG(4,179,4) = 0
-    DEG(4,179,5) = 0
-    DEG(4,179,6) = 0
-    DEG(4,179,7) = 0
-    DEG(4,179,8) = 1
-    DEG(4,179,9) = 0
-    DEG(4,179,10) = 0
-    DEG(4,179,11) = 1
-    DEG(4,179,12) = 0
-  COEF(4,179) = (0.2224861364141455, 0)
-    DEG(4,180,1) = 0
-    DEG(4,180,2) = 1
-    DEG(4,180,3) = 0
-    DEG(4,180,4) = 1
-    DEG(4,180,5) = 0
-    DEG(4,180,6) = 0
-    DEG(4,180,7) = 0
-    DEG(4,180,8) = 1
-    DEG(4,180,9) = 0
-    DEG(4,180,10) = 0
-    DEG(4,180,11) = 1
-    DEG(4,180,12) = 0
-  COEF(4,180) = (-0.10364294061438788, 0)
-    DEG(4,181,1) = 0
-    DEG(4,181,2) = 1
-    DEG(4,181,3) = 0
-    DEG(4,181,4) = 0
-    DEG(4,181,5) = 1
-    DEG(4,181,6) = 0
-    DEG(4,181,7) = 0
-    DEG(4,181,8) = 1
-    DEG(4,181,9) = 0
-    DEG(4,181,10) = 0
-    DEG(4,181,11) = 1
-    DEG(4,181,12) = 0
-  COEF(4,181) = (-0.2224861364141455, 0)
-    DEG(4,182,1) = 0
-    DEG(4,182,2) = 1
-    DEG(4,182,3) = 0
-    DEG(4,182,4) = 0
-    DEG(4,182,5) = 0
-    DEG(4,182,6) = 1
-    DEG(4,182,7) = 0
-    DEG(4,182,8) = 1
-    DEG(4,182,9) = 0
-    DEG(4,182,10) = 0
-    DEG(4,182,11) = 1
-    DEG(4,182,12) = 0
-  COEF(4,182) = (-0.05802633468698669, 0)
-    DEG(4,183,1) = 0
-    DEG(4,183,2) = 0
-    DEG(4,183,3) = 0
-    DEG(4,183,4) = 0
-    DEG(4,183,5) = 0
-    DEG(4,183,6) = 0
-    DEG(4,183,7) = 0
-    DEG(4,183,8) = 0
-    DEG(4,183,9) = 1
-    DEG(4,183,10) = 0
-    DEG(4,183,11) = 1
-    DEG(4,183,12) = 0
-  COEF(4,183) = (3.435999891436883, 0)
-    DEG(4,184,1) = 0
-    DEG(4,184,2) = 1
-    DEG(4,184,3) = 0
-    DEG(4,184,4) = 1
-    DEG(4,184,5) = 0
-    DEG(4,184,6) = 0
-    DEG(4,184,7) = 0
-    DEG(4,184,8) = 0
-    DEG(4,184,9) = 1
-    DEG(4,184,10) = 0
-    DEG(4,184,11) = 1
-    DEG(4,184,12) = 0
-  COEF(4,184) = (0.26037743907080846, 0)
-    DEG(4,185,1) = 0
-    DEG(4,185,2) = 1
-    DEG(4,185,3) = 0
-    DEG(4,185,4) = 0
-    DEG(4,185,5) = 1
-    DEG(4,185,6) = 0
-    DEG(4,185,7) = 0
-    DEG(4,185,8) = 0
-    DEG(4,185,9) = 1
-    DEG(4,185,10) = 0
-    DEG(4,185,11) = 1
-    DEG(4,185,12) = 0
-  COEF(4,185) = (-3.435999891436883, 0)
-    DEG(4,186,1) = 0
-    DEG(4,186,2) = 1
-    DEG(4,186,3) = 0
-    DEG(4,186,4) = 0
-    DEG(4,186,5) = 0
-    DEG(4,186,6) = 1
-    DEG(4,186,7) = 0
-    DEG(4,186,8) = 0
-    DEG(4,186,9) = 1
-    DEG(4,186,10) = 0
-    DEG(4,186,11) = 1
-    DEG(4,186,12) = 0
-  COEF(4,186) = (-1.2270157745253036, 0)
-    DEG(4,187,1) = 0
-    DEG(4,187,2) = 0
-    DEG(4,187,3) = 0
-    DEG(4,187,4) = 0
-    DEG(4,187,5) = 0
-    DEG(4,187,6) = 0
-    DEG(4,187,7) = 0
-    DEG(4,187,8) = 0
-    DEG(4,187,9) = 0
-    DEG(4,187,10) = 0
-    DEG(4,187,11) = 0
-    DEG(4,187,12) = 1
-  COEF(4,187) = (-1.5710537578152084, 0)
-    DEG(4,188,1) = 0
-    DEG(4,188,2) = 0
-    DEG(4,188,3) = 1
-    DEG(4,188,4) = 1
-    DEG(4,188,5) = 0
-    DEG(4,188,6) = 0
-    DEG(4,188,7) = 0
-    DEG(4,188,8) = 0
-    DEG(4,188,9) = 0
-    DEG(4,188,10) = 0
-    DEG(4,188,11) = 0
-    DEG(4,188,12) = 1
-  COEF(4,188) = (1.9748956866392908, 0)
-    DEG(4,189,1) = 0
-    DEG(4,189,2) = 0
-    DEG(4,189,3) = 1
-    DEG(4,189,4) = 0
-    DEG(4,189,5) = 1
-    DEG(4,189,6) = 0
-    DEG(4,189,7) = 0
-    DEG(4,189,8) = 0
-    DEG(4,189,9) = 0
-    DEG(4,189,10) = 0
-    DEG(4,189,11) = 0
-    DEG(4,189,12) = 1
-  COEF(4,189) = (-0.6605037584056619, 0)
-    DEG(4,190,1) = 0
-    DEG(4,190,2) = 0
-    DEG(4,190,3) = 1
-    DEG(4,190,4) = 0
-    DEG(4,190,5) = 0
-    DEG(4,190,6) = 1
-    DEG(4,190,7) = 0
-    DEG(4,190,8) = 0
-    DEG(4,190,9) = 0
-    DEG(4,190,10) = 0
-    DEG(4,190,11) = 0
-    DEG(4,190,12) = 1
-  COEF(4,190) = (1.5710537578152084, 0)
-    DEG(4,191,1) = 0
-    DEG(4,191,2) = 0
-    DEG(4,191,3) = 0
-    DEG(4,191,4) = 0
-    DEG(4,191,5) = 0
-    DEG(4,191,6) = 0
-    DEG(4,191,7) = 1
-    DEG(4,191,8) = 0
-    DEG(4,191,9) = 0
-    DEG(4,191,10) = 0
-    DEG(4,191,11) = 0
-    DEG(4,191,12) = 1
-  COEF(4,191) = (0.489378443504812, 0)
-    DEG(4,192,1) = 0
-    DEG(4,192,2) = 0
-    DEG(4,192,3) = 1
-    DEG(4,192,4) = 1
-    DEG(4,192,5) = 0
-    DEG(4,192,6) = 0
-    DEG(4,192,7) = 1
-    DEG(4,192,8) = 0
-    DEG(4,192,9) = 0
-    DEG(4,192,10) = 0
-    DEG(4,192,11) = 0
-    DEG(4,192,12) = 1
-  COEF(4,192) = (3.6028650897534913, 0)
-    DEG(4,193,1) = 0
-    DEG(4,193,2) = 0
-    DEG(4,193,3) = 1
-    DEG(4,193,4) = 0
-    DEG(4,193,5) = 1
-    DEG(4,193,6) = 0
-    DEG(4,193,7) = 1
-    DEG(4,193,8) = 0
-    DEG(4,193,9) = 0
-    DEG(4,193,10) = 0
-    DEG(4,193,11) = 0
-    DEG(4,193,12) = 1
-  COEF(4,193) = (0.4399827278441305, 0)
-    DEG(4,194,1) = 0
-    DEG(4,194,2) = 0
-    DEG(4,194,3) = 1
-    DEG(4,194,4) = 0
-    DEG(4,194,5) = 0
-    DEG(4,194,6) = 1
-    DEG(4,194,7) = 1
-    DEG(4,194,8) = 0
-    DEG(4,194,9) = 0
-    DEG(4,194,10) = 0
-    DEG(4,194,11) = 0
-    DEG(4,194,12) = 1
-  COEF(4,194) = (-0.489378443504812, 0)
-    DEG(4,195,1) = 0
-    DEG(4,195,2) = 0
-    DEG(4,195,3) = 0
-    DEG(4,195,4) = 0
-    DEG(4,195,5) = 0
-    DEG(4,195,6) = 0
-    DEG(4,195,7) = 0
-    DEG(4,195,8) = 1
-    DEG(4,195,9) = 0
-    DEG(4,195,10) = 0
-    DEG(4,195,11) = 0
-    DEG(4,195,12) = 1
-  COEF(4,195) = (0.05802633468698669, 0)
-    DEG(4,196,1) = 0
-    DEG(4,196,2) = 0
-    DEG(4,196,3) = 1
-    DEG(4,196,4) = 1
-    DEG(4,196,5) = 0
-    DEG(4,196,6) = 0
-    DEG(4,196,7) = 0
-    DEG(4,196,8) = 1
-    DEG(4,196,9) = 0
-    DEG(4,196,10) = 0
-    DEG(4,196,11) = 0
-    DEG(4,196,12) = 1
-  COEF(4,196) = (-0.10364294061438788, 0)
-    DEG(4,197,1) = 0
-    DEG(4,197,2) = 0
-    DEG(4,197,3) = 1
-    DEG(4,197,4) = 0
-    DEG(4,197,5) = 1
-    DEG(4,197,6) = 0
-    DEG(4,197,7) = 0
-    DEG(4,197,8) = 1
-    DEG(4,197,9) = 0
-    DEG(4,197,10) = 0
-    DEG(4,197,11) = 0
-    DEG(4,197,12) = 1
-  COEF(4,197) = (-0.2224861364141455, 0)
-    DEG(4,198,1) = 0
-    DEG(4,198,2) = 0
-    DEG(4,198,3) = 1
-    DEG(4,198,4) = 0
-    DEG(4,198,5) = 0
-    DEG(4,198,6) = 1
-    DEG(4,198,7) = 0
-    DEG(4,198,8) = 1
-    DEG(4,198,9) = 0
-    DEG(4,198,10) = 0
-    DEG(4,198,11) = 0
-    DEG(4,198,12) = 1
-  COEF(4,198) = (-0.05802633468698669, 0)
-    DEG(4,199,1) = 0
-    DEG(4,199,2) = 0
-    DEG(4,199,3) = 0
-    DEG(4,199,4) = 0
-    DEG(4,199,5) = 0
-    DEG(4,199,6) = 0
-    DEG(4,199,7) = 0
-    DEG(4,199,8) = 0
-    DEG(4,199,9) = 1
-    DEG(4,199,10) = 0
-    DEG(4,199,11) = 0
-    DEG(4,199,12) = 1
-  COEF(4,199) = (1.2270157745253036, 0)
-    DEG(4,200,1) = 0
-    DEG(4,200,2) = 0
-    DEG(4,200,3) = 1
-    DEG(4,200,4) = 1
-    DEG(4,200,5) = 0
-    DEG(4,200,6) = 0
-    DEG(4,200,7) = 0
-    DEG(4,200,8) = 0
-    DEG(4,200,9) = 1
-    DEG(4,200,10) = 0
-    DEG(4,200,11) = 0
-    DEG(4,200,12) = 1
-  COEF(4,200) = (0.26037743907080846, 0)
-    DEG(4,201,1) = 0
-    DEG(4,201,2) = 0
-    DEG(4,201,3) = 1
-    DEG(4,201,4) = 0
-    DEG(4,201,5) = 1
-    DEG(4,201,6) = 0
-    DEG(4,201,7) = 0
-    DEG(4,201,8) = 0
-    DEG(4,201,9) = 1
-    DEG(4,201,10) = 0
-    DEG(4,201,11) = 0
-    DEG(4,201,12) = 1
-  COEF(4,201) = (-3.435999891436883, 0)
-    DEG(4,202,1) = 0
-    DEG(4,202,2) = 0
-    DEG(4,202,3) = 1
-    DEG(4,202,4) = 0
-    DEG(4,202,5) = 0
-    DEG(4,202,6) = 1
-    DEG(4,202,7) = 0
-    DEG(4,202,8) = 0
-    DEG(4,202,9) = 1
-    DEG(4,202,10) = 0
-    DEG(4,202,11) = 0
-    DEG(4,202,12) = 1
-  COEF(4,202) = (-1.2270157745253036, 0)
-
-NUM_TERMS(5) = 202
-    DEG(5,1,1) = 0
-    DEG(5,1,2) = 0
-    DEG(5,1,3) = 0
-    DEG(5,1,4) = 0
-    DEG(5,1,5) = 0
-    DEG(5,1,6) = 0
-    DEG(5,1,7) = 0
-    DEG(5,1,8) = 0
-    DEG(5,1,9) = 0
-    DEG(5,1,10) = 0
-    DEG(5,1,11) = 0
-    DEG(5,1,12) = 0
-  COEF(5,1) = (0.08701076562565797, 0)
-    DEG(5,2,1) = 1
-    DEG(5,2,2) = 0
-    DEG(5,2,3) = 0
-    DEG(5,2,4) = 1
-    DEG(5,2,5) = 0
-    DEG(5,2,6) = 0
-    DEG(5,2,7) = 0
-    DEG(5,2,8) = 0
-    DEG(5,2,9) = 0
-    DEG(5,2,10) = 0
-    DEG(5,2,11) = 0
-    DEG(5,2,12) = 0
-  COEF(5,2) = (0.6587146302368447, 0)
-    DEG(5,3,1) = 0
-    DEG(5,3,2) = 1
-    DEG(5,3,3) = 0
-    DEG(5,3,4) = 1
-    DEG(5,3,5) = 0
-    DEG(5,3,6) = 0
-    DEG(5,3,7) = 0
-    DEG(5,3,8) = 0
-    DEG(5,3,9) = 0
-    DEG(5,3,10) = 0
-    DEG(5,3,11) = 0
-    DEG(5,3,12) = 0
-  COEF(5,3) = (0.97049378734119, 0)
-    DEG(5,4,1) = 0
-    DEG(5,4,2) = 0
-    DEG(5,4,3) = 1
-    DEG(5,4,4) = 1
-    DEG(5,4,5) = 0
-    DEG(5,4,6) = 0
-    DEG(5,4,7) = 0
-    DEG(5,4,8) = 0
-    DEG(5,4,9) = 0
-    DEG(5,4,10) = 0
-    DEG(5,4,11) = 0
-    DEG(5,4,12) = 0
-  COEF(5,4) = (-0.3629488630998051, 0)
-    DEG(5,5,1) = 0
-    DEG(5,5,2) = 0
-    DEG(5,5,3) = 0
-    DEG(5,5,4) = 2
-    DEG(5,5,5) = 0
-    DEG(5,5,6) = 0
-    DEG(5,5,7) = 0
-    DEG(5,5,8) = 0
-    DEG(5,5,9) = 0
-    DEG(5,5,10) = 0
-    DEG(5,5,11) = 0
-    DEG(5,5,12) = 0
-  COEF(5,5) = (-0.32935731511842237, 0)
-    DEG(5,6,1) = 1
-    DEG(5,6,2) = 0
-    DEG(5,6,3) = 0
-    DEG(5,6,4) = 0
-    DEG(5,6,5) = 1
-    DEG(5,6,6) = 0
-    DEG(5,6,7) = 0
-    DEG(5,6,8) = 0
-    DEG(5,6,9) = 0
-    DEG(5,6,10) = 0
-    DEG(5,6,11) = 0
-    DEG(5,6,12) = 0
-  COEF(5,6) = (0.97049378734119, 0)
-    DEG(5,7,1) = 0
-    DEG(5,7,2) = 1
-    DEG(5,7,3) = 0
-    DEG(5,7,4) = 0
-    DEG(5,7,5) = 1
-    DEG(5,7,6) = 0
-    DEG(5,7,7) = 0
-    DEG(5,7,8) = 0
-    DEG(5,7,9) = 0
-    DEG(5,7,10) = 0
-    DEG(5,7,11) = 0
-    DEG(5,7,12) = 0
-  COEF(5,7) = (-0.8382706255793325, 0)
-    DEG(5,8,1) = 0
-    DEG(5,8,2) = 0
-    DEG(5,8,3) = 1
-    DEG(5,8,4) = 0
-    DEG(5,8,5) = 1
-    DEG(5,8,6) = 0
-    DEG(5,8,7) = 0
-    DEG(5,8,8) = 0
-    DEG(5,8,9) = 0
-    DEG(5,8,10) = 0
-    DEG(5,8,11) = 0
-    DEG(5,8,12) = 0
-  COEF(5,8) = (0.12936444115570186, 0)
-    DEG(5,9,1) = 0
-    DEG(5,9,2) = 0
-    DEG(5,9,3) = 0
-    DEG(5,9,4) = 1
-    DEG(5,9,5) = 1
-    DEG(5,9,6) = 0
-    DEG(5,9,7) = 0
-    DEG(5,9,8) = 0
-    DEG(5,9,9) = 0
-    DEG(5,9,10) = 0
-    DEG(5,9,11) = 0
-    DEG(5,9,12) = 0
-  COEF(5,9) = (-0.97049378734119, 0)
-    DEG(5,10,1) = 0
-    DEG(5,10,2) = 0
-    DEG(5,10,3) = 0
-    DEG(5,10,4) = 0
-    DEG(5,10,5) = 2
-    DEG(5,10,6) = 0
-    DEG(5,10,7) = 0
-    DEG(5,10,8) = 0
-    DEG(5,10,9) = 0
-    DEG(5,10,10) = 0
-    DEG(5,10,11) = 0
-    DEG(5,10,12) = 0
-  COEF(5,10) = (0.41913531278966626, 0)
-    DEG(5,11,1) = 1
-    DEG(5,11,2) = 0
-    DEG(5,11,3) = 0
-    DEG(5,11,4) = 0
-    DEG(5,11,5) = 0
-    DEG(5,11,6) = 1
-    DEG(5,11,7) = 0
-    DEG(5,11,8) = 0
-    DEG(5,11,9) = 0
-    DEG(5,11,10) = 0
-    DEG(5,11,11) = 0
-    DEG(5,11,12) = 0
-  COEF(5,11) = (-0.3629488630998051, 0)
-    DEG(5,12,1) = 0
-    DEG(5,12,2) = 1
-    DEG(5,12,3) = 0
-    DEG(5,12,4) = 0
-    DEG(5,12,5) = 0
-    DEG(5,12,6) = 1
-    DEG(5,12,7) = 0
-    DEG(5,12,8) = 0
-    DEG(5,12,9) = 0
-    DEG(5,12,10) = 0
-    DEG(5,12,11) = 0
-    DEG(5,12,12) = 0
-  COEF(5,12) = (0.12936444115570186, 0)
-    DEG(5,13,1) = 0
-    DEG(5,13,2) = 0
-    DEG(5,13,3) = 1
-    DEG(5,13,4) = 0
-    DEG(5,13,5) = 0
-    DEG(5,13,6) = 1
-    DEG(5,13,7) = 0
-    DEG(5,13,8) = 0
-    DEG(5,13,9) = 0
-    DEG(5,13,10) = 0
-    DEG(5,13,11) = 0
-    DEG(5,13,12) = 0
-  COEF(5,13) = (0.005534464091171834, 0)
-    DEG(5,14,1) = 0
-    DEG(5,14,2) = 0
-    DEG(5,14,3) = 0
-    DEG(5,14,4) = 1
-    DEG(5,14,5) = 0
-    DEG(5,14,6) = 1
-    DEG(5,14,7) = 0
-    DEG(5,14,8) = 0
-    DEG(5,14,9) = 0
-    DEG(5,14,10) = 0
-    DEG(5,14,11) = 0
-    DEG(5,14,12) = 0
-  COEF(5,14) = (0.3629488630998051, 0)
-    DEG(5,15,1) = 0
-    DEG(5,15,2) = 0
-    DEG(5,15,3) = 0
-    DEG(5,15,4) = 0
-    DEG(5,15,5) = 1
-    DEG(5,15,6) = 1
-    DEG(5,15,7) = 0
-    DEG(5,15,8) = 0
-    DEG(5,15,9) = 0
-    DEG(5,15,10) = 0
-    DEG(5,15,11) = 0
-    DEG(5,15,12) = 0
-  COEF(5,15) = (-0.12936444115570186, 0)
-    DEG(5,16,1) = 0
-    DEG(5,16,2) = 0
-    DEG(5,16,3) = 0
-    DEG(5,16,4) = 0
-    DEG(5,16,5) = 0
-    DEG(5,16,6) = 2
-    DEG(5,16,7) = 0
-    DEG(5,16,8) = 0
-    DEG(5,16,9) = 0
-    DEG(5,16,10) = 0
-    DEG(5,16,11) = 0
-    DEG(5,16,12) = 0
-  COEF(5,16) = (-0.002767232045585917, 0)
-    DEG(5,17,1) = 0
-    DEG(5,17,2) = 0
-    DEG(5,17,3) = 0
-    DEG(5,17,4) = 0
-    DEG(5,17,5) = 0
-    DEG(5,17,6) = 0
-    DEG(5,17,7) = 1
-    DEG(5,17,8) = 0
-    DEG(5,17,9) = 0
-    DEG(5,17,10) = 0
-    DEG(5,17,11) = 0
-    DEG(5,17,12) = 0
-  COEF(5,17) = (-3.6986003185751537, 0)
-    DEG(5,18,1) = 1
-    DEG(5,18,2) = 0
-    DEG(5,18,3) = 0
-    DEG(5,18,4) = 1
-    DEG(5,18,5) = 0
-    DEG(5,18,6) = 0
-    DEG(5,18,7) = 1
-    DEG(5,18,8) = 0
-    DEG(5,18,9) = 0
-    DEG(5,18,10) = 0
-    DEG(5,18,11) = 0
-    DEG(5,18,12) = 0
-  COEF(5,18) = (5.9785568815852175, 0)
-    DEG(5,19,1) = 0
-    DEG(5,19,2) = 1
-    DEG(5,19,3) = 0
-    DEG(5,19,4) = 1
-    DEG(5,19,5) = 0
-    DEG(5,19,6) = 0
-    DEG(5,19,7) = 1
-    DEG(5,19,8) = 0
-    DEG(5,19,9) = 0
-    DEG(5,19,10) = 0
-    DEG(5,19,11) = 0
-    DEG(5,19,12) = 0
-  COEF(5,19) = (-0.9870449988115901, 0)
-    DEG(5,20,1) = 0
-    DEG(5,20,2) = 0
-    DEG(5,20,3) = 1
-    DEG(5,20,4) = 1
-    DEG(5,20,5) = 0
-    DEG(5,20,6) = 0
-    DEG(5,20,7) = 1
-    DEG(5,20,8) = 0
-    DEG(5,20,9) = 0
-    DEG(5,20,10) = 0
-    DEG(5,20,11) = 0
-    DEG(5,20,12) = 0
-  COEF(5,20) = (0.6095355787283003, 0)
-    DEG(5,21,1) = 0
-    DEG(5,21,2) = 0
-    DEG(5,21,3) = 0
-    DEG(5,21,4) = 2
-    DEG(5,21,5) = 0
-    DEG(5,21,6) = 0
-    DEG(5,21,7) = 1
-    DEG(5,21,8) = 0
-    DEG(5,21,9) = 0
-    DEG(5,21,10) = 0
-    DEG(5,21,11) = 0
-    DEG(5,21,12) = 0
-  COEF(5,21) = (-2.9892784407926087, 0)
-    DEG(5,22,1) = 1
-    DEG(5,22,2) = 0
-    DEG(5,22,3) = 0
-    DEG(5,22,4) = 0
-    DEG(5,22,5) = 1
-    DEG(5,22,6) = 0
-    DEG(5,22,7) = 1
-    DEG(5,22,8) = 0
-    DEG(5,22,9) = 0
-    DEG(5,22,10) = 0
-    DEG(5,22,11) = 0
-    DEG(5,22,12) = 0
-  COEF(5,22) = (-0.9870449988115901, 0)
-    DEG(5,23,1) = 0
-    DEG(5,23,2) = 1
-    DEG(5,23,3) = 0
-    DEG(5,23,4) = 0
-    DEG(5,23,5) = 1
-    DEG(5,23,6) = 0
-    DEG(5,23,7) = 1
-    DEG(5,23,8) = 0
-    DEG(5,23,9) = 0
-    DEG(5,23,10) = 0
-    DEG(5,23,11) = 0
-    DEG(5,23,12) = 0
-  COEF(5,23) = (1.3059928665069536, 0)
-    DEG(5,24,1) = 0
-    DEG(5,24,2) = 0
-    DEG(5,24,3) = 1
-    DEG(5,24,4) = 0
-    DEG(5,24,5) = 1
-    DEG(5,24,6) = 0
-    DEG(5,24,7) = 1
-    DEG(5,24,8) = 0
-    DEG(5,24,9) = 0
-    DEG(5,24,10) = 0
-    DEG(5,24,11) = 0
-    DEG(5,24,12) = 0
-  COEF(5,24) = (-0.6605632912654023, 0)
-    DEG(5,25,1) = 0
-    DEG(5,25,2) = 0
-    DEG(5,25,3) = 0
-    DEG(5,25,4) = 1
-    DEG(5,25,5) = 1
-    DEG(5,25,6) = 0
-    DEG(5,25,7) = 1
-    DEG(5,25,8) = 0
-    DEG(5,25,9) = 0
-    DEG(5,25,10) = 0
-    DEG(5,25,11) = 0
-    DEG(5,25,12) = 0
-  COEF(5,25) = (0.9870449988115901, 0)
-    DEG(5,26,1) = 0
-    DEG(5,26,2) = 0
-    DEG(5,26,3) = 0
-    DEG(5,26,4) = 0
-    DEG(5,26,5) = 2
-    DEG(5,26,6) = 0
-    DEG(5,26,7) = 1
-    DEG(5,26,8) = 0
-    DEG(5,26,9) = 0
-    DEG(5,26,10) = 0
-    DEG(5,26,11) = 0
-    DEG(5,26,12) = 0
-  COEF(5,26) = (-0.6529964332534768, 0)
-    DEG(5,27,1) = 1
-    DEG(5,27,2) = 0
-    DEG(5,27,3) = 0
-    DEG(5,27,4) = 0
-    DEG(5,27,5) = 0
-    DEG(5,27,6) = 1
-    DEG(5,27,7) = 1
-    DEG(5,27,8) = 0
-    DEG(5,27,9) = 0
-    DEG(5,27,10) = 0
-    DEG(5,27,11) = 0
-    DEG(5,27,12) = 0
-  COEF(5,27) = (0.6095355787283003, 0)
-    DEG(5,28,1) = 0
-    DEG(5,28,2) = 1
-    DEG(5,28,3) = 0
-    DEG(5,28,4) = 0
-    DEG(5,28,5) = 0
-    DEG(5,28,6) = 1
-    DEG(5,28,7) = 1
-    DEG(5,28,8) = 0
-    DEG(5,28,9) = 0
-    DEG(5,28,10) = 0
-    DEG(5,28,11) = 0
-    DEG(5,28,12) = 0
-  COEF(5,28) = (-0.6605632912654023, 0)
-    DEG(5,29,1) = 0
-    DEG(5,29,2) = 0
-    DEG(5,29,3) = 1
-    DEG(5,29,4) = 0
-    DEG(5,29,5) = 0
-    DEG(5,29,6) = 1
-    DEG(5,29,7) = 1
-    DEG(5,29,8) = 0
-    DEG(5,29,9) = 0
-    DEG(5,29,10) = 0
-    DEG(5,29,11) = 0
-    DEG(5,29,12) = 0
-  COEF(5,29) = (0.11265088905813643, 0)
-    DEG(5,30,1) = 0
-    DEG(5,30,2) = 0
-    DEG(5,30,3) = 0
-    DEG(5,30,4) = 1
-    DEG(5,30,5) = 0
-    DEG(5,30,6) = 1
-    DEG(5,30,7) = 1
-    DEG(5,30,8) = 0
-    DEG(5,30,9) = 0
-    DEG(5,30,10) = 0
-    DEG(5,30,11) = 0
-    DEG(5,30,12) = 0
-  COEF(5,30) = (-0.6095355787283003, 0)
-    DEG(5,31,1) = 0
-    DEG(5,31,2) = 0
-    DEG(5,31,3) = 0
-    DEG(5,31,4) = 0
-    DEG(5,31,5) = 1
-    DEG(5,31,6) = 1
-    DEG(5,31,7) = 1
-    DEG(5,31,8) = 0
-    DEG(5,31,9) = 0
-    DEG(5,31,10) = 0
-    DEG(5,31,11) = 0
-    DEG(5,31,12) = 0
-  COEF(5,31) = (0.6605632912654023, 0)
-    DEG(5,32,1) = 0
-    DEG(5,32,2) = 0
-    DEG(5,32,3) = 0
-    DEG(5,32,4) = 0
-    DEG(5,32,5) = 0
-    DEG(5,32,6) = 2
-    DEG(5,32,7) = 1
-    DEG(5,32,8) = 0
-    DEG(5,32,9) = 0
-    DEG(5,32,10) = 0
-    DEG(5,32,11) = 0
-    DEG(5,32,12) = 0
-  COEF(5,32) = (-0.056325444529068215, 0)
-    DEG(5,33,1) = 1
-    DEG(5,33,2) = 0
-    DEG(5,33,3) = 0
-    DEG(5,33,4) = 1
-    DEG(5,33,5) = 0
-    DEG(5,33,6) = 0
-    DEG(5,33,7) = 2
-    DEG(5,33,8) = 0
-    DEG(5,33,9) = 0
-    DEG(5,33,10) = 0
-    DEG(5,33,11) = 0
-    DEG(5,33,12) = 0
-  COEF(5,33) = (0.3582877343376877, 0)
-    DEG(5,34,1) = 0
-    DEG(5,34,2) = 1
-    DEG(5,34,3) = 0
-    DEG(5,34,4) = 1
-    DEG(5,34,5) = 0
-    DEG(5,34,6) = 0
-    DEG(5,34,7) = 2
-    DEG(5,34,8) = 0
-    DEG(5,34,9) = 0
-    DEG(5,34,10) = 0
-    DEG(5,34,11) = 0
-    DEG(5,34,12) = 0
-  COEF(5,34) = (1.6562913750174673, 0)
-    DEG(5,35,1) = 0
-    DEG(5,35,2) = 0
-    DEG(5,35,3) = 1
-    DEG(5,35,4) = 1
-    DEG(5,35,5) = 0
-    DEG(5,35,6) = 0
-    DEG(5,35,7) = 2
-    DEG(5,35,8) = 0
-    DEG(5,35,9) = 0
-    DEG(5,35,10) = 0
-    DEG(5,35,11) = 0
-    DEG(5,35,12) = 0
-  COEF(5,35) = (-0.46612950753637256, 0)
-    DEG(5,36,1) = 0
-    DEG(5,36,2) = 0
-    DEG(5,36,3) = 0
-    DEG(5,36,4) = 2
-    DEG(5,36,5) = 0
-    DEG(5,36,6) = 0
-    DEG(5,36,7) = 2
-    DEG(5,36,8) = 0
-    DEG(5,36,9) = 0
-    DEG(5,36,10) = 0
-    DEG(5,36,11) = 0
-    DEG(5,36,12) = 0
-  COEF(5,36) = (-0.17914386716884384, 0)
-    DEG(5,37,1) = 1
-    DEG(5,37,2) = 0
-    DEG(5,37,3) = 0
-    DEG(5,37,4) = 0
-    DEG(5,37,5) = 1
-    DEG(5,37,6) = 0
-    DEG(5,37,7) = 2
-    DEG(5,37,8) = 0
-    DEG(5,37,9) = 0
-    DEG(5,37,10) = 0
-    DEG(5,37,11) = 0
-    DEG(5,37,12) = 0
-  COEF(5,37) = (1.6562913750174673, 0)
-    DEG(5,38,1) = 0
-    DEG(5,38,2) = 1
-    DEG(5,38,3) = 0
-    DEG(5,38,4) = 0
-    DEG(5,38,5) = 1
-    DEG(5,38,6) = 0
-    DEG(5,38,7) = 2
-    DEG(5,38,8) = 0
-    DEG(5,38,9) = 0
-    DEG(5,38,10) = 0
-    DEG(5,38,11) = 0
-    DEG(5,38,12) = 0
-  COEF(5,38) = (-0.11469773229096966, 0)
-    DEG(5,39,1) = 0
-    DEG(5,39,2) = 0
-    DEG(5,39,3) = 1
-    DEG(5,39,4) = 0
-    DEG(5,39,5) = 1
-    DEG(5,39,6) = 0
-    DEG(5,39,7) = 2
-    DEG(5,39,8) = 0
-    DEG(5,39,9) = 0
-    DEG(5,39,10) = 0
-    DEG(5,39,11) = 0
-    DEG(5,39,12) = 0
-  COEF(5,39) = (0.41536252810110713, 0)
-    DEG(5,40,1) = 0
-    DEG(5,40,2) = 0
-    DEG(5,40,3) = 0
-    DEG(5,40,4) = 1
-    DEG(5,40,5) = 1
-    DEG(5,40,6) = 0
-    DEG(5,40,7) = 2
-    DEG(5,40,8) = 0
-    DEG(5,40,9) = 0
-    DEG(5,40,10) = 0
-    DEG(5,40,11) = 0
-    DEG(5,40,12) = 0
-  COEF(5,40) = (-1.6562913750174673, 0)
-    DEG(5,41,1) = 0
-    DEG(5,41,2) = 0
-    DEG(5,41,3) = 0
-    DEG(5,41,4) = 0
-    DEG(5,41,5) = 2
-    DEG(5,41,6) = 0
-    DEG(5,41,7) = 2
-    DEG(5,41,8) = 0
-    DEG(5,41,9) = 0
-    DEG(5,41,10) = 0
-    DEG(5,41,11) = 0
-    DEG(5,41,12) = 0
-  COEF(5,41) = (0.05734886614548483, 0)
-    DEG(5,42,1) = 1
-    DEG(5,42,2) = 0
-    DEG(5,42,3) = 0
-    DEG(5,42,4) = 0
-    DEG(5,42,5) = 0
-    DEG(5,42,6) = 1
-    DEG(5,42,7) = 2
-    DEG(5,42,8) = 0
-    DEG(5,42,9) = 0
-    DEG(5,42,10) = 0
-    DEG(5,42,11) = 0
-    DEG(5,42,12) = 0
-  COEF(5,42) = (-0.46612950753637256, 0)
-    DEG(5,43,1) = 0
-    DEG(5,43,2) = 1
-    DEG(5,43,3) = 0
-    DEG(5,43,4) = 0
-    DEG(5,43,5) = 0
-    DEG(5,43,6) = 1
-    DEG(5,43,7) = 2
-    DEG(5,43,8) = 0
-    DEG(5,43,9) = 0
-    DEG(5,43,10) = 0
-    DEG(5,43,11) = 0
-    DEG(5,43,12) = 0
-  COEF(5,43) = (0.41536252810110713, 0)
-    DEG(5,44,1) = 0
-    DEG(5,44,2) = 0
-    DEG(5,44,3) = 1
-    DEG(5,44,4) = 0
-    DEG(5,44,5) = 0
-    DEG(5,44,6) = 1
-    DEG(5,44,7) = 2
-    DEG(5,44,8) = 0
-    DEG(5,44,9) = 0
-    DEG(5,44,10) = 0
-    DEG(5,44,11) = 0
-    DEG(5,44,12) = 0
-  COEF(5,44) = (-0.24359000204671802, 0)
-    DEG(5,45,1) = 0
-    DEG(5,45,2) = 0
-    DEG(5,45,3) = 0
-    DEG(5,45,4) = 1
-    DEG(5,45,5) = 0
-    DEG(5,45,6) = 1
-    DEG(5,45,7) = 2
-    DEG(5,45,8) = 0
-    DEG(5,45,9) = 0
-    DEG(5,45,10) = 0
-    DEG(5,45,11) = 0
-    DEG(5,45,12) = 0
-  COEF(5,45) = (0.46612950753637256, 0)
-    DEG(5,46,1) = 0
-    DEG(5,46,2) = 0
-    DEG(5,46,3) = 0
-    DEG(5,46,4) = 0
-    DEG(5,46,5) = 1
-    DEG(5,46,6) = 1
-    DEG(5,46,7) = 2
-    DEG(5,46,8) = 0
-    DEG(5,46,9) = 0
-    DEG(5,46,10) = 0
-    DEG(5,46,11) = 0
-    DEG(5,46,12) = 0
-  COEF(5,46) = (-0.41536252810110713, 0)
-    DEG(5,47,1) = 0
-    DEG(5,47,2) = 0
-    DEG(5,47,3) = 0
-    DEG(5,47,4) = 0
-    DEG(5,47,5) = 0
-    DEG(5,47,6) = 2
-    DEG(5,47,7) = 2
-    DEG(5,47,8) = 0
-    DEG(5,47,9) = 0
-    DEG(5,47,10) = 0
-    DEG(5,47,11) = 0
-    DEG(5,47,12) = 0
-  COEF(5,47) = (0.12179500102335901, 0)
-    DEG(5,48,1) = 0
-    DEG(5,48,2) = 0
-    DEG(5,48,3) = 0
-    DEG(5,48,4) = 0
-    DEG(5,48,5) = 0
-    DEG(5,48,6) = 0
-    DEG(5,48,7) = 0
-    DEG(5,48,8) = 1
-    DEG(5,48,9) = 0
-    DEG(5,48,10) = 0
-    DEG(5,48,11) = 0
-    DEG(5,48,12) = 0
-  COEF(5,48) = (0.031096027328737095, 0)
-    DEG(5,49,1) = 1
-    DEG(5,49,2) = 0
-    DEG(5,49,3) = 0
-    DEG(5,49,4) = 1
-    DEG(5,49,5) = 0
-    DEG(5,49,6) = 0
-    DEG(5,49,7) = 0
-    DEG(5,49,8) = 1
-    DEG(5,49,9) = 0
-    DEG(5,49,10) = 0
-    DEG(5,49,11) = 0
-    DEG(5,49,12) = 0
-  COEF(5,49) = (2.4048644947592765, 0)
-    DEG(5,50,1) = 0
-    DEG(5,50,2) = 1
-    DEG(5,50,3) = 0
-    DEG(5,50,4) = 1
-    DEG(5,50,5) = 0
-    DEG(5,50,6) = 0
-    DEG(5,50,7) = 0
-    DEG(5,50,8) = 1
-    DEG(5,50,9) = 0
-    DEG(5,50,10) = 0
-    DEG(5,50,11) = 0
-    DEG(5,50,12) = 0
-  COEF(5,50) = (-0.1249446226586355, 0)
-    DEG(5,51,1) = 0
-    DEG(5,51,2) = 0
-    DEG(5,51,3) = 1
-    DEG(5,51,4) = 1
-    DEG(5,51,5) = 0
-    DEG(5,51,6) = 0
-    DEG(5,51,7) = 0
-    DEG(5,51,8) = 1
-    DEG(5,51,9) = 0
-    DEG(5,51,10) = 0
-    DEG(5,51,11) = 0
-    DEG(5,51,12) = 0
-  COEF(5,51) = (2.0011875015137464, 0)
-    DEG(5,52,1) = 0
-    DEG(5,52,2) = 0
-    DEG(5,52,3) = 0
-    DEG(5,52,4) = 2
-    DEG(5,52,5) = 0
-    DEG(5,52,6) = 0
-    DEG(5,52,7) = 0
-    DEG(5,52,8) = 1
-    DEG(5,52,9) = 0
-    DEG(5,52,10) = 0
-    DEG(5,52,11) = 0
-    DEG(5,52,12) = 0
-  COEF(5,52) = (-1.2024322473796383, 0)
-    DEG(5,53,1) = 1
-    DEG(5,53,2) = 0
-    DEG(5,53,3) = 0
-    DEG(5,53,4) = 0
-    DEG(5,53,5) = 1
-    DEG(5,53,6) = 0
-    DEG(5,53,7) = 0
-    DEG(5,53,8) = 1
-    DEG(5,53,9) = 0
-    DEG(5,53,10) = 0
-    DEG(5,53,11) = 0
-    DEG(5,53,12) = 0
-  COEF(5,53) = (-0.1249446226586355, 0)
-    DEG(5,54,1) = 0
-    DEG(5,54,2) = 1
-    DEG(5,54,3) = 0
-    DEG(5,54,4) = 0
-    DEG(5,54,5) = 1
-    DEG(5,54,6) = 0
-    DEG(5,54,7) = 0
-    DEG(5,54,8) = 1
-    DEG(5,54,9) = 0
-    DEG(5,54,10) = 0
-    DEG(5,54,11) = 0
-    DEG(5,54,12) = 0
-  COEF(5,54) = (-2.1091711451550177, 0)
-    DEG(5,55,1) = 0
-    DEG(5,55,2) = 0
-    DEG(5,55,3) = 1
-    DEG(5,55,4) = 0
-    DEG(5,55,5) = 1
-    DEG(5,55,6) = 0
-    DEG(5,55,7) = 0
-    DEG(5,55,8) = 1
-    DEG(5,55,9) = 0
-    DEG(5,55,10) = 0
-    DEG(5,55,11) = 0
-    DEG(5,55,12) = 0
-  COEF(5,55) = (0.058624034539361006, 0)
-    DEG(5,56,1) = 0
-    DEG(5,56,2) = 0
-    DEG(5,56,3) = 0
-    DEG(5,56,4) = 1
-    DEG(5,56,5) = 1
-    DEG(5,56,6) = 0
-    DEG(5,56,7) = 0
-    DEG(5,56,8) = 1
-    DEG(5,56,9) = 0
-    DEG(5,56,10) = 0
-    DEG(5,56,11) = 0
-    DEG(5,56,12) = 0
-  COEF(5,56) = (0.1249446226586355, 0)
-    DEG(5,57,1) = 0
-    DEG(5,57,2) = 0
-    DEG(5,57,3) = 0
-    DEG(5,57,4) = 0
-    DEG(5,57,5) = 2
-    DEG(5,57,6) = 0
-    DEG(5,57,7) = 0
-    DEG(5,57,8) = 1
-    DEG(5,57,9) = 0
-    DEG(5,57,10) = 0
-    DEG(5,57,11) = 0
-    DEG(5,57,12) = 0
-  COEF(5,57) = (1.0545855725775088, 0)
-    DEG(5,58,1) = 1
-    DEG(5,58,2) = 0
-    DEG(5,58,3) = 0
-    DEG(5,58,4) = 0
-    DEG(5,58,5) = 0
-    DEG(5,58,6) = 1
-    DEG(5,58,7) = 0
-    DEG(5,58,8) = 1
-    DEG(5,58,9) = 0
-    DEG(5,58,10) = 0
-    DEG(5,58,11) = 0
-    DEG(5,58,12) = 0
-  COEF(5,58) = (2.0011875015137464, 0)
-    DEG(5,59,1) = 0
-    DEG(5,59,2) = 1
-    DEG(5,59,3) = 0
-    DEG(5,59,4) = 0
-    DEG(5,59,5) = 0
-    DEG(5,59,6) = 1
-    DEG(5,59,7) = 0
-    DEG(5,59,8) = 1
-    DEG(5,59,9) = 0
-    DEG(5,59,10) = 0
-    DEG(5,59,11) = 0
-    DEG(5,59,12) = 0
-  COEF(5,59) = (0.058624034539361006, 0)
-    DEG(5,60,1) = 0
-    DEG(5,60,2) = 0
-    DEG(5,60,3) = 1
-    DEG(5,60,4) = 0
-    DEG(5,60,5) = 0
-    DEG(5,60,6) = 1
-    DEG(5,60,7) = 0
-    DEG(5,60,8) = 1
-    DEG(5,60,9) = 0
-    DEG(5,60,10) = 0
-    DEG(5,60,11) = 0
-    DEG(5,60,12) = 0
-  COEF(5,60) = (-0.35788540426173304, 0)
-    DEG(5,61,1) = 0
-    DEG(5,61,2) = 0
-    DEG(5,61,3) = 0
-    DEG(5,61,4) = 1
-    DEG(5,61,5) = 0
-    DEG(5,61,6) = 1
-    DEG(5,61,7) = 0
-    DEG(5,61,8) = 1
-    DEG(5,61,9) = 0
-    DEG(5,61,10) = 0
-    DEG(5,61,11) = 0
-    DEG(5,61,12) = 0
-  COEF(5,61) = (-2.0011875015137464, 0)
-    DEG(5,62,1) = 0
-    DEG(5,62,2) = 0
-    DEG(5,62,3) = 0
-    DEG(5,62,4) = 0
-    DEG(5,62,5) = 1
-    DEG(5,62,6) = 1
-    DEG(5,62,7) = 0
-    DEG(5,62,8) = 1
-    DEG(5,62,9) = 0
-    DEG(5,62,10) = 0
-    DEG(5,62,11) = 0
-    DEG(5,62,12) = 0
-  COEF(5,62) = (-0.058624034539361006, 0)
-    DEG(5,63,1) = 0
-    DEG(5,63,2) = 0
-    DEG(5,63,3) = 0
-    DEG(5,63,4) = 0
-    DEG(5,63,5) = 0
-    DEG(5,63,6) = 2
-    DEG(5,63,7) = 0
-    DEG(5,63,8) = 1
-    DEG(5,63,9) = 0
-    DEG(5,63,10) = 0
-    DEG(5,63,11) = 0
-    DEG(5,63,12) = 0
-  COEF(5,63) = (0.17894270213086652, 0)
-    DEG(5,64,1) = 1
-    DEG(5,64,2) = 0
-    DEG(5,64,3) = 0
-    DEG(5,64,4) = 1
-    DEG(5,64,5) = 0
-    DEG(5,64,6) = 0
-    DEG(5,64,7) = 1
-    DEG(5,64,8) = 1
-    DEG(5,64,9) = 0
-    DEG(5,64,10) = 0
-    DEG(5,64,11) = 0
-    DEG(5,64,12) = 0
-  COEF(5,64) = (-1.0900987001246538, 0)
-    DEG(5,65,1) = 0
-    DEG(5,65,2) = 1
-    DEG(5,65,3) = 0
-    DEG(5,65,4) = 1
-    DEG(5,65,5) = 0
-    DEG(5,65,6) = 0
-    DEG(5,65,7) = 1
-    DEG(5,65,8) = 1
-    DEG(5,65,9) = 0
-    DEG(5,65,10) = 0
-    DEG(5,65,11) = 0
-    DEG(5,65,12) = 0
-  COEF(5,65) = (-1.231041760354661, 0)
-    DEG(5,66,1) = 0
-    DEG(5,66,2) = 0
-    DEG(5,66,3) = 1
-    DEG(5,66,4) = 1
-    DEG(5,66,5) = 0
-    DEG(5,66,6) = 0
-    DEG(5,66,7) = 1
-    DEG(5,66,8) = 1
-    DEG(5,66,9) = 0
-    DEG(5,66,10) = 0
-    DEG(5,66,11) = 0
-    DEG(5,66,12) = 0
-  COEF(5,66) = (1.1023322693687834, 0)
-    DEG(5,67,1) = 0
-    DEG(5,67,2) = 0
-    DEG(5,67,3) = 0
-    DEG(5,67,4) = 2
-    DEG(5,67,5) = 0
-    DEG(5,67,6) = 0
-    DEG(5,67,7) = 1
-    DEG(5,67,8) = 1
-    DEG(5,67,9) = 0
-    DEG(5,67,10) = 0
-    DEG(5,67,11) = 0
-    DEG(5,67,12) = 0
-  COEF(5,67) = (0.5450493500623269, 0)
-    DEG(5,68,1) = 1
-    DEG(5,68,2) = 0
-    DEG(5,68,3) = 0
-    DEG(5,68,4) = 0
-    DEG(5,68,5) = 1
-    DEG(5,68,6) = 0
-    DEG(5,68,7) = 1
-    DEG(5,68,8) = 1
-    DEG(5,68,9) = 0
-    DEG(5,68,10) = 0
-    DEG(5,68,11) = 0
-    DEG(5,68,12) = 0
-  COEF(5,68) = (-1.231041760354661, 0)
-    DEG(5,69,1) = 0
-    DEG(5,69,2) = 1
-    DEG(5,69,3) = 0
-    DEG(5,69,4) = 0
-    DEG(5,69,5) = 1
-    DEG(5,69,6) = 0
-    DEG(5,69,7) = 1
-    DEG(5,69,8) = 1
-    DEG(5,69,9) = 0
-    DEG(5,69,10) = 0
-    DEG(5,69,11) = 0
-    DEG(5,69,12) = 0
-  COEF(5,69) = (1.050348874342487, 0)
-    DEG(5,70,1) = 0
-    DEG(5,70,2) = 0
-    DEG(5,70,3) = 1
-    DEG(5,70,4) = 0
-    DEG(5,70,5) = 1
-    DEG(5,70,6) = 0
-    DEG(5,70,7) = 1
-    DEG(5,70,8) = 1
-    DEG(5,70,9) = 0
-    DEG(5,70,10) = 0
-    DEG(5,70,11) = 0
-    DEG(5,70,12) = 0
-  COEF(5,70) = (0.33080339443456586, 0)
-    DEG(5,71,1) = 0
-    DEG(5,71,2) = 0
-    DEG(5,71,3) = 0
-    DEG(5,71,4) = 1
-    DEG(5,71,5) = 1
-    DEG(5,71,6) = 0
-    DEG(5,71,7) = 1
-    DEG(5,71,8) = 1
-    DEG(5,71,9) = 0
-    DEG(5,71,10) = 0
-    DEG(5,71,11) = 0
-    DEG(5,71,12) = 0
-  COEF(5,71) = (1.231041760354661, 0)
-    DEG(5,72,1) = 0
-    DEG(5,72,2) = 0
-    DEG(5,72,3) = 0
-    DEG(5,72,4) = 0
-    DEG(5,72,5) = 2
-    DEG(5,72,6) = 0
-    DEG(5,72,7) = 1
-    DEG(5,72,8) = 1
-    DEG(5,72,9) = 0
-    DEG(5,72,10) = 0
-    DEG(5,72,11) = 0
-    DEG(5,72,12) = 0
-  COEF(5,72) = (-0.5251744371712435, 0)
-    DEG(5,73,1) = 1
-    DEG(5,73,2) = 0
-    DEG(5,73,3) = 0
-    DEG(5,73,4) = 0
-    DEG(5,73,5) = 0
-    DEG(5,73,6) = 1
-    DEG(5,73,7) = 1
-    DEG(5,73,8) = 1
-    DEG(5,73,9) = 0
-    DEG(5,73,10) = 0
-    DEG(5,73,11) = 0
-    DEG(5,73,12) = 0
-  COEF(5,73) = (1.1023322693687834, 0)
-    DEG(5,74,1) = 0
-    DEG(5,74,2) = 1
-    DEG(5,74,3) = 0
-    DEG(5,74,4) = 0
-    DEG(5,74,5) = 0
-    DEG(5,74,6) = 1
-    DEG(5,74,7) = 1
-    DEG(5,74,8) = 1
-    DEG(5,74,9) = 0
-    DEG(5,74,10) = 0
-    DEG(5,74,11) = 0
-    DEG(5,74,12) = 0
-  COEF(5,74) = (0.33080339443456586, 0)
-    DEG(5,75,1) = 0
-    DEG(5,75,2) = 0
-    DEG(5,75,3) = 1
-    DEG(5,75,4) = 0
-    DEG(5,75,5) = 0
-    DEG(5,75,6) = 1
-    DEG(5,75,7) = 1
-    DEG(5,75,8) = 1
-    DEG(5,75,9) = 0
-    DEG(5,75,10) = 0
-    DEG(5,75,11) = 0
-    DEG(5,75,12) = 0
-  COEF(5,75) = (0.039749825782166875, 0)
-    DEG(5,76,1) = 0
-    DEG(5,76,2) = 0
-    DEG(5,76,3) = 0
-    DEG(5,76,4) = 1
-    DEG(5,76,5) = 0
-    DEG(5,76,6) = 1
-    DEG(5,76,7) = 1
-    DEG(5,76,8) = 1
-    DEG(5,76,9) = 0
-    DEG(5,76,10) = 0
-    DEG(5,76,11) = 0
-    DEG(5,76,12) = 0
-  COEF(5,76) = (-1.1023322693687834, 0)
-    DEG(5,77,1) = 0
-    DEG(5,77,2) = 0
-    DEG(5,77,3) = 0
-    DEG(5,77,4) = 0
-    DEG(5,77,5) = 1
-    DEG(5,77,6) = 1
-    DEG(5,77,7) = 1
-    DEG(5,77,8) = 1
-    DEG(5,77,9) = 0
-    DEG(5,77,10) = 0
-    DEG(5,77,11) = 0
-    DEG(5,77,12) = 0
-  COEF(5,77) = (-0.33080339443456586, 0)
-    DEG(5,78,1) = 0
-    DEG(5,78,2) = 0
-    DEG(5,78,3) = 0
-    DEG(5,78,4) = 0
-    DEG(5,78,5) = 0
-    DEG(5,78,6) = 2
-    DEG(5,78,7) = 1
-    DEG(5,78,8) = 1
-    DEG(5,78,9) = 0
-    DEG(5,78,10) = 0
-    DEG(5,78,11) = 0
-    DEG(5,78,12) = 0
-  COEF(5,78) = (-0.019874912891083438, 0)
-    DEG(5,79,1) = 1
-    DEG(5,79,2) = 0
-    DEG(5,79,3) = 0
-    DEG(5,79,4) = 1
-    DEG(5,79,5) = 0
-    DEG(5,79,6) = 0
-    DEG(5,79,7) = 0
-    DEG(5,79,8) = 2
-    DEG(5,79,9) = 0
-    DEG(5,79,10) = 0
-    DEG(5,79,11) = 0
-    DEG(5,79,12) = 0
-  COEF(5,79) = (-0.5324245067247965, 0)
-    DEG(5,80,1) = 0
-    DEG(5,80,2) = 1
-    DEG(5,80,3) = 0
-    DEG(5,80,4) = 1
-    DEG(5,80,5) = 0
-    DEG(5,80,6) = 0
-    DEG(5,80,7) = 0
-    DEG(5,80,8) = 2
-    DEG(5,80,9) = 0
-    DEG(5,80,10) = 0
-    DEG(5,80,11) = 0
-    DEG(5,80,12) = 0
-  COEF(5,80) = (-1.0325056065644542, 0)
-    DEG(5,81,1) = 0
-    DEG(5,81,2) = 0
-    DEG(5,81,3) = 1
-    DEG(5,81,4) = 1
-    DEG(5,81,5) = 0
-    DEG(5,81,6) = 0
-    DEG(5,81,7) = 0
-    DEG(5,81,8) = 2
-    DEG(5,81,9) = 0
-    DEG(5,81,10) = 0
-    DEG(5,81,11) = 0
-    DEG(5,81,12) = 0
-  COEF(5,81) = (0.20925111216625922, 0)
-    DEG(5,82,1) = 0
-    DEG(5,82,2) = 0
-    DEG(5,82,3) = 0
-    DEG(5,82,4) = 2
-    DEG(5,82,5) = 0
-    DEG(5,82,6) = 0
-    DEG(5,82,7) = 0
-    DEG(5,82,8) = 2
-    DEG(5,82,9) = 0
-    DEG(5,82,10) = 0
-    DEG(5,82,11) = 0
-    DEG(5,82,12) = 0
-  COEF(5,82) = (0.26621225336239823, 0)
-    DEG(5,83,1) = 1
-    DEG(5,83,2) = 0
-    DEG(5,83,3) = 0
-    DEG(5,83,4) = 0
-    DEG(5,83,5) = 1
-    DEG(5,83,6) = 0
-    DEG(5,83,7) = 0
-    DEG(5,83,8) = 2
-    DEG(5,83,9) = 0
-    DEG(5,83,10) = 0
-    DEG(5,83,11) = 0
-    DEG(5,83,12) = 0
-  COEF(5,83) = (-1.0325056065644542, 0)
-    DEG(5,84,1) = 0
-    DEG(5,84,2) = 1
-    DEG(5,84,3) = 0
-    DEG(5,84,4) = 0
-    DEG(5,84,5) = 1
-    DEG(5,84,6) = 0
-    DEG(5,84,7) = 0
-    DEG(5,84,8) = 2
-    DEG(5,84,9) = 0
-    DEG(5,84,10) = 0
-    DEG(5,84,11) = 0
-    DEG(5,84,12) = 0
-  COEF(5,84) = (-1.1038381213709827, 0)
-    DEG(5,85,1) = 0
-    DEG(5,85,2) = 0
-    DEG(5,85,3) = 1
-    DEG(5,85,4) = 0
-    DEG(5,85,5) = 1
-    DEG(5,85,6) = 0
-    DEG(5,85,7) = 0
-    DEG(5,85,8) = 2
-    DEG(5,85,9) = 0
-    DEG(5,85,10) = 0
-    DEG(5,85,11) = 0
-    DEG(5,85,12) = 0
-  COEF(5,85) = (-0.8367829980477751, 0)
-    DEG(5,86,1) = 0
-    DEG(5,86,2) = 0
-    DEG(5,86,3) = 0
-    DEG(5,86,4) = 1
-    DEG(5,86,5) = 1
-    DEG(5,86,6) = 0
-    DEG(5,86,7) = 0
-    DEG(5,86,8) = 2
-    DEG(5,86,9) = 0
-    DEG(5,86,10) = 0
-    DEG(5,86,11) = 0
-    DEG(5,86,12) = 0
-  COEF(5,86) = (1.0325056065644542, 0)
-    DEG(5,87,1) = 0
-    DEG(5,87,2) = 0
-    DEG(5,87,3) = 0
-    DEG(5,87,4) = 0
-    DEG(5,87,5) = 2
-    DEG(5,87,6) = 0
-    DEG(5,87,7) = 0
-    DEG(5,87,8) = 2
-    DEG(5,87,9) = 0
-    DEG(5,87,10) = 0
-    DEG(5,87,11) = 0
-    DEG(5,87,12) = 0
-  COEF(5,87) = (0.5519190606854913, 0)
-    DEG(5,88,1) = 1
-    DEG(5,88,2) = 0
-    DEG(5,88,3) = 0
-    DEG(5,88,4) = 0
-    DEG(5,88,5) = 0
-    DEG(5,88,6) = 1
-    DEG(5,88,7) = 0
-    DEG(5,88,8) = 2
-    DEG(5,88,9) = 0
-    DEG(5,88,10) = 0
-    DEG(5,88,11) = 0
-    DEG(5,88,12) = 0
-  COEF(5,88) = (0.20925111216625922, 0)
-    DEG(5,89,1) = 0
-    DEG(5,89,2) = 1
-    DEG(5,89,3) = 0
-    DEG(5,89,4) = 0
-    DEG(5,89,5) = 0
-    DEG(5,89,6) = 1
-    DEG(5,89,7) = 0
-    DEG(5,89,8) = 2
-    DEG(5,89,9) = 0
-    DEG(5,89,10) = 0
-    DEG(5,89,11) = 0
-    DEG(5,89,12) = 0
-  COEF(5,89) = (-0.8367829980477751, 0)
-    DEG(5,90,1) = 0
-    DEG(5,90,2) = 0
-    DEG(5,90,3) = 1
-    DEG(5,90,4) = 0
-    DEG(5,90,5) = 0
-    DEG(5,90,6) = 1
-    DEG(5,90,7) = 0
-    DEG(5,90,8) = 2
-    DEG(5,90,9) = 0
-    DEG(5,90,10) = 0
-    DEG(5,90,11) = 0
-    DEG(5,90,12) = 0
-  COEF(5,90) = (1.636262628095779, 0)
-    DEG(5,91,1) = 0
-    DEG(5,91,2) = 0
-    DEG(5,91,3) = 0
-    DEG(5,91,4) = 1
-    DEG(5,91,5) = 0
-    DEG(5,91,6) = 1
-    DEG(5,91,7) = 0
-    DEG(5,91,8) = 2
-    DEG(5,91,9) = 0
-    DEG(5,91,10) = 0
-    DEG(5,91,11) = 0
-    DEG(5,91,12) = 0
-  COEF(5,91) = (-0.20925111216625922, 0)
-    DEG(5,92,1) = 0
-    DEG(5,92,2) = 0
-    DEG(5,92,3) = 0
-    DEG(5,92,4) = 0
-    DEG(5,92,5) = 1
-    DEG(5,92,6) = 1
-    DEG(5,92,7) = 0
-    DEG(5,92,8) = 2
-    DEG(5,92,9) = 0
-    DEG(5,92,10) = 0
-    DEG(5,92,11) = 0
-    DEG(5,92,12) = 0
-  COEF(5,92) = (0.8367829980477751, 0)
-    DEG(5,93,1) = 0
-    DEG(5,93,2) = 0
-    DEG(5,93,3) = 0
-    DEG(5,93,4) = 0
-    DEG(5,93,5) = 0
-    DEG(5,93,6) = 2
-    DEG(5,93,7) = 0
-    DEG(5,93,8) = 2
-    DEG(5,93,9) = 0
-    DEG(5,93,10) = 0
-    DEG(5,93,11) = 0
-    DEG(5,93,12) = 0
-  COEF(5,93) = (-0.8181313140478895, 0)
-    DEG(5,94,1) = 0
-    DEG(5,94,2) = 0
-    DEG(5,94,3) = 0
-    DEG(5,94,4) = 0
-    DEG(5,94,5) = 0
-    DEG(5,94,6) = 0
-    DEG(5,94,7) = 0
-    DEG(5,94,8) = 0
-    DEG(5,94,9) = 1
-    DEG(5,94,10) = 0
-    DEG(5,94,11) = 0
-    DEG(5,94,12) = 0
-  COEF(5,94) = (-0.5044517075731615, 0)
-    DEG(5,95,1) = 1
-    DEG(5,95,2) = 0
-    DEG(5,95,3) = 0
-    DEG(5,95,4) = 1
-    DEG(5,95,5) = 0
-    DEG(5,95,6) = 0
-    DEG(5,95,7) = 0
-    DEG(5,95,8) = 0
-    DEG(5,95,9) = 1
-    DEG(5,95,10) = 0
-    DEG(5,95,11) = 0
-    DEG(5,95,12) = 0
-  COEF(5,95) = (0.6864217968627093, 0)
-    DEG(5,96,1) = 0
-    DEG(5,96,2) = 1
-    DEG(5,96,3) = 0
-    DEG(5,96,4) = 1
-    DEG(5,96,5) = 0
-    DEG(5,96,6) = 0
-    DEG(5,96,7) = 0
-    DEG(5,96,8) = 0
-    DEG(5,96,9) = 1
-    DEG(5,96,10) = 0
-    DEG(5,96,11) = 0
-    DEG(5,96,12) = 0
-  COEF(5,96) = (-0.9610910151178695, 0)
-    DEG(5,97,1) = 0
-    DEG(5,97,2) = 0
-    DEG(5,97,3) = 1
-    DEG(5,97,4) = 1
-    DEG(5,97,5) = 0
-    DEG(5,97,6) = 0
-    DEG(5,97,7) = 0
-    DEG(5,97,8) = 0
-    DEG(5,97,9) = 1
-    DEG(5,97,10) = 0
-    DEG(5,97,11) = 0
-    DEG(5,97,12) = 0
-  COEF(5,97) = (0.524595115594299, 0)
-    DEG(5,98,1) = 0
-    DEG(5,98,2) = 0
-    DEG(5,98,3) = 0
-    DEG(5,98,4) = 2
-    DEG(5,98,5) = 0
-    DEG(5,98,6) = 0
-    DEG(5,98,7) = 0
-    DEG(5,98,8) = 0
-    DEG(5,98,9) = 1
-    DEG(5,98,10) = 0
-    DEG(5,98,11) = 0
-    DEG(5,98,12) = 0
-  COEF(5,98) = (-0.34321089843135466, 0)
-    DEG(5,99,1) = 1
-    DEG(5,99,2) = 0
-    DEG(5,99,3) = 0
-    DEG(5,99,4) = 0
-    DEG(5,99,5) = 1
-    DEG(5,99,6) = 0
-    DEG(5,99,7) = 0
-    DEG(5,99,8) = 0
-    DEG(5,99,9) = 1
-    DEG(5,99,10) = 0
-    DEG(5,99,11) = 0
-    DEG(5,99,12) = 0
-  COEF(5,99) = (-0.9610910151178695, 0)
-    DEG(5,100,1) = 0
-    DEG(5,100,2) = 1
-    DEG(5,100,3) = 0
-    DEG(5,100,4) = 0
-    DEG(5,100,5) = 1
-    DEG(5,100,6) = 0
-    DEG(5,100,7) = 0
-    DEG(5,100,8) = 0
-    DEG(5,100,9) = 1
-    DEG(5,100,10) = 0
-    DEG(5,100,11) = 0
-    DEG(5,100,12) = 0
-  COEF(5,100) = (-0.2029093325022418, 0)
-    DEG(5,101,1) = 0
-    DEG(5,101,2) = 0
-    DEG(5,101,3) = 1
-    DEG(5,101,4) = 0
-    DEG(5,101,5) = 1
-    DEG(5,101,6) = 0
-    DEG(5,101,7) = 0
-    DEG(5,101,8) = 0
-    DEG(5,101,9) = 1
-    DEG(5,101,10) = 0
-    DEG(5,101,11) = 0
-    DEG(5,101,12) = 0
-  COEF(5,101) = (-0.9835931139929495, 0)
-    DEG(5,102,1) = 0
-    DEG(5,102,2) = 0
-    DEG(5,102,3) = 0
-    DEG(5,102,4) = 1
-    DEG(5,102,5) = 1
-    DEG(5,102,6) = 0
-    DEG(5,102,7) = 0
-    DEG(5,102,8) = 0
-    DEG(5,102,9) = 1
-    DEG(5,102,10) = 0
-    DEG(5,102,11) = 0
-    DEG(5,102,12) = 0
-  COEF(5,102) = (0.9610910151178695, 0)
-    DEG(5,103,1) = 0
-    DEG(5,103,2) = 0
-    DEG(5,103,3) = 0
-    DEG(5,103,4) = 0
-    DEG(5,103,5) = 2
-    DEG(5,103,6) = 0
-    DEG(5,103,7) = 0
-    DEG(5,103,8) = 0
-    DEG(5,103,9) = 1
-    DEG(5,103,10) = 0
-    DEG(5,103,11) = 0
-    DEG(5,103,12) = 0
-  COEF(5,103) = (0.1014546662511209, 0)
-    DEG(5,104,1) = 1
-    DEG(5,104,2) = 0
-    DEG(5,104,3) = 0
-    DEG(5,104,4) = 0
-    DEG(5,104,5) = 0
-    DEG(5,104,6) = 1
-    DEG(5,104,7) = 0
-    DEG(5,104,8) = 0
-    DEG(5,104,9) = 1
-    DEG(5,104,10) = 0
-    DEG(5,104,11) = 0
-    DEG(5,104,12) = 0
-  COEF(5,104) = (0.524595115594299, 0)
-    DEG(5,105,1) = 0
-    DEG(5,105,2) = 1
-    DEG(5,105,3) = 0
-    DEG(5,105,4) = 0
-    DEG(5,105,5) = 0
-    DEG(5,105,6) = 1
-    DEG(5,105,7) = 0
-    DEG(5,105,8) = 0
-    DEG(5,105,9) = 1
-    DEG(5,105,10) = 0
-    DEG(5,105,11) = 0
-    DEG(5,105,12) = 0
-  COEF(5,105) = (-0.9835931139929495, 0)
-    DEG(5,106,1) = 0
-    DEG(5,106,2) = 0
-    DEG(5,106,3) = 1
-    DEG(5,106,4) = 0
-    DEG(5,106,5) = 0
-    DEG(5,106,6) = 1
-    DEG(5,106,7) = 0
-    DEG(5,106,8) = 0
-    DEG(5,106,9) = 1
-    DEG(5,106,10) = 0
-    DEG(5,106,11) = 0
-    DEG(5,106,12) = 0
-  COEF(5,106) = (0.5253909507858554, 0)
-    DEG(5,107,1) = 0
-    DEG(5,107,2) = 0
-    DEG(5,107,3) = 0
-    DEG(5,107,4) = 1
-    DEG(5,107,5) = 0
-    DEG(5,107,6) = 1
-    DEG(5,107,7) = 0
-    DEG(5,107,8) = 0
-    DEG(5,107,9) = 1
-    DEG(5,107,10) = 0
-    DEG(5,107,11) = 0
-    DEG(5,107,12) = 0
-  COEF(5,107) = (-0.524595115594299, 0)
-    DEG(5,108,1) = 0
-    DEG(5,108,2) = 0
-    DEG(5,108,3) = 0
-    DEG(5,108,4) = 0
-    DEG(5,108,5) = 1
-    DEG(5,108,6) = 1
-    DEG(5,108,7) = 0
-    DEG(5,108,8) = 0
-    DEG(5,108,9) = 1
-    DEG(5,108,10) = 0
-    DEG(5,108,11) = 0
-    DEG(5,108,12) = 0
-  COEF(5,108) = (0.9835931139929495, 0)
-    DEG(5,109,1) = 0
-    DEG(5,109,2) = 0
-    DEG(5,109,3) = 0
-    DEG(5,109,4) = 0
-    DEG(5,109,5) = 0
-    DEG(5,109,6) = 2
-    DEG(5,109,7) = 0
-    DEG(5,109,8) = 0
-    DEG(5,109,9) = 1
-    DEG(5,109,10) = 0
-    DEG(5,109,11) = 0
-    DEG(5,109,12) = 0
-  COEF(5,109) = (-0.2626954753929277, 0)
-    DEG(5,110,1) = 1
-    DEG(5,110,2) = 0
-    DEG(5,110,3) = 0
-    DEG(5,110,4) = 1
-    DEG(5,110,5) = 0
-    DEG(5,110,6) = 0
-    DEG(5,110,7) = 1
-    DEG(5,110,8) = 0
-    DEG(5,110,9) = 1
-    DEG(5,110,10) = 0
-    DEG(5,110,11) = 0
-    DEG(5,110,12) = 0
-  COEF(5,110) = (2.617421247613866, 0)
-    DEG(5,111,1) = 0
-    DEG(5,111,2) = 1
-    DEG(5,111,3) = 0
-    DEG(5,111,4) = 1
-    DEG(5,111,5) = 0
-    DEG(5,111,6) = 0
-    DEG(5,111,7) = 1
-    DEG(5,111,8) = 0
-    DEG(5,111,9) = 1
-    DEG(5,111,10) = 0
-    DEG(5,111,11) = 0
-    DEG(5,111,12) = 0
-  COEF(5,111) = (-1.518125718569227, 0)
-    DEG(5,112,1) = 0
-    DEG(5,112,2) = 0
-    DEG(5,112,3) = 1
-    DEG(5,112,4) = 1
-    DEG(5,112,5) = 0
-    DEG(5,112,6) = 0
-    DEG(5,112,7) = 1
-    DEG(5,112,8) = 0
-    DEG(5,112,9) = 1
-    DEG(5,112,10) = 0
-    DEG(5,112,11) = 0
-    DEG(5,112,12) = 0
-  COEF(5,112) = (-1.8909026046892188, 0)
-    DEG(5,113,1) = 0
-    DEG(5,113,2) = 0
-    DEG(5,113,3) = 0
-    DEG(5,113,4) = 2
-    DEG(5,113,5) = 0
-    DEG(5,113,6) = 0
-    DEG(5,113,7) = 1
-    DEG(5,113,8) = 0
-    DEG(5,113,9) = 1
-    DEG(5,113,10) = 0
-    DEG(5,113,11) = 0
-    DEG(5,113,12) = 0
-  COEF(5,113) = (-1.308710623806933, 0)
-    DEG(5,114,1) = 1
-    DEG(5,114,2) = 0
-    DEG(5,114,3) = 0
-    DEG(5,114,4) = 0
-    DEG(5,114,5) = 1
-    DEG(5,114,6) = 0
-    DEG(5,114,7) = 1
-    DEG(5,114,8) = 0
-    DEG(5,114,9) = 1
-    DEG(5,114,10) = 0
-    DEG(5,114,11) = 0
-    DEG(5,114,12) = 0
-  COEF(5,114) = (-1.518125718569227, 0)
-    DEG(5,115,1) = 0
-    DEG(5,115,2) = 1
-    DEG(5,115,3) = 0
-    DEG(5,115,4) = 0
-    DEG(5,115,5) = 1
-    DEG(5,115,6) = 0
-    DEG(5,115,7) = 1
-    DEG(5,115,8) = 0
-    DEG(5,115,9) = 1
-    DEG(5,115,10) = 0
-    DEG(5,115,11) = 0
-    DEG(5,115,12) = 0
-  COEF(5,115) = (-1.2346452877362135, 0)
-    DEG(5,116,1) = 0
-    DEG(5,116,2) = 0
-    DEG(5,116,3) = 1
-    DEG(5,116,4) = 0
-    DEG(5,116,5) = 1
-    DEG(5,116,6) = 0
-    DEG(5,116,7) = 1
-    DEG(5,116,8) = 0
-    DEG(5,116,9) = 1
-    DEG(5,116,10) = 0
-    DEG(5,116,11) = 0
-    DEG(5,116,12) = 0
-  COEF(5,116) = (0.4403913101255323, 0)
-    DEG(5,117,1) = 0
-    DEG(5,117,2) = 0
-    DEG(5,117,3) = 0
-    DEG(5,117,4) = 1
-    DEG(5,117,5) = 1
-    DEG(5,117,6) = 0
-    DEG(5,117,7) = 1
-    DEG(5,117,8) = 0
-    DEG(5,117,9) = 1
-    DEG(5,117,10) = 0
-    DEG(5,117,11) = 0
-    DEG(5,117,12) = 0
-  COEF(5,117) = (1.518125718569227, 0)
-    DEG(5,118,1) = 0
-    DEG(5,118,2) = 0
-    DEG(5,118,3) = 0
-    DEG(5,118,4) = 0
-    DEG(5,118,5) = 2
-    DEG(5,118,6) = 0
-    DEG(5,118,7) = 1
-    DEG(5,118,8) = 0
-    DEG(5,118,9) = 1
-    DEG(5,118,10) = 0
-    DEG(5,118,11) = 0
-    DEG(5,118,12) = 0
-  COEF(5,118) = (0.6173226438681068, 0)
-    DEG(5,119,1) = 1
-    DEG(5,119,2) = 0
-    DEG(5,119,3) = 0
-    DEG(5,119,4) = 0
-    DEG(5,119,5) = 0
-    DEG(5,119,6) = 1
-    DEG(5,119,7) = 1
-    DEG(5,119,8) = 0
-    DEG(5,119,9) = 1
-    DEG(5,119,10) = 0
-    DEG(5,119,11) = 0
-    DEG(5,119,12) = 0
-  COEF(5,119) = (-1.8909026046892188, 0)
-    DEG(5,120,1) = 0
-    DEG(5,120,2) = 1
-    DEG(5,120,3) = 0
-    DEG(5,120,4) = 0
-    DEG(5,120,5) = 0
-    DEG(5,120,6) = 1
-    DEG(5,120,7) = 1
-    DEG(5,120,8) = 0
-    DEG(5,120,9) = 1
-    DEG(5,120,10) = 0
-    DEG(5,120,11) = 0
-    DEG(5,120,12) = 0
-  COEF(5,120) = (0.4403913101255323, 0)
-    DEG(5,121,1) = 0
-    DEG(5,121,2) = 0
-    DEG(5,121,3) = 1
-    DEG(5,121,4) = 0
-    DEG(5,121,5) = 0
-    DEG(5,121,6) = 1
-    DEG(5,121,7) = 1
-    DEG(5,121,8) = 0
-    DEG(5,121,9) = 1
-    DEG(5,121,10) = 0
-    DEG(5,121,11) = 0
-    DEG(5,121,12) = 0
-  COEF(5,121) = (-1.3827759598776528, 0)
-    DEG(5,122,1) = 0
-    DEG(5,122,2) = 0
-    DEG(5,122,3) = 0
-    DEG(5,122,4) = 1
-    DEG(5,122,5) = 0
-    DEG(5,122,6) = 1
-    DEG(5,122,7) = 1
-    DEG(5,122,8) = 0
-    DEG(5,122,9) = 1
-    DEG(5,122,10) = 0
-    DEG(5,122,11) = 0
-    DEG(5,122,12) = 0
-  COEF(5,122) = (1.8909026046892188, 0)
-    DEG(5,123,1) = 0
-    DEG(5,123,2) = 0
-    DEG(5,123,3) = 0
-    DEG(5,123,4) = 0
-    DEG(5,123,5) = 1
-    DEG(5,123,6) = 1
-    DEG(5,123,7) = 1
-    DEG(5,123,8) = 0
-    DEG(5,123,9) = 1
-    DEG(5,123,10) = 0
-    DEG(5,123,11) = 0
-    DEG(5,123,12) = 0
-  COEF(5,123) = (-0.4403913101255323, 0)
-    DEG(5,124,1) = 0
-    DEG(5,124,2) = 0
-    DEG(5,124,3) = 0
-    DEG(5,124,4) = 0
-    DEG(5,124,5) = 0
-    DEG(5,124,6) = 2
-    DEG(5,124,7) = 1
-    DEG(5,124,8) = 0
-    DEG(5,124,9) = 1
-    DEG(5,124,10) = 0
-    DEG(5,124,11) = 0
-    DEG(5,124,12) = 0
-  COEF(5,124) = (0.6913879799388264, 0)
-    DEG(5,125,1) = 1
-    DEG(5,125,2) = 0
-    DEG(5,125,3) = 0
-    DEG(5,125,4) = 1
-    DEG(5,125,5) = 0
-    DEG(5,125,6) = 0
-    DEG(5,125,7) = 0
-    DEG(5,125,8) = 1
-    DEG(5,125,9) = 1
-    DEG(5,125,10) = 0
-    DEG(5,125,11) = 0
-    DEG(5,125,12) = 0
-  COEF(5,125) = (1.0268881898279654, 0)
-    DEG(5,126,1) = 0
-    DEG(5,126,2) = 1
-    DEG(5,126,3) = 0
-    DEG(5,126,4) = 1
-    DEG(5,126,5) = 0
-    DEG(5,126,6) = 0
-    DEG(5,126,7) = 0
-    DEG(5,126,8) = 1
-    DEG(5,126,9) = 1
-    DEG(5,126,10) = 0
-    DEG(5,126,11) = 0
-    DEG(5,126,12) = 0
-  COEF(5,126) = (-0.1771148913635722, 0)
-    DEG(5,127,1) = 0
-    DEG(5,127,2) = 0
-    DEG(5,127,3) = 1
-    DEG(5,127,4) = 1
-    DEG(5,127,5) = 0
-    DEG(5,127,6) = 0
-    DEG(5,127,7) = 0
-    DEG(5,127,8) = 1
-    DEG(5,127,9) = 1
-    DEG(5,127,10) = 0
-    DEG(5,127,11) = 0
-    DEG(5,127,12) = 0
-  COEF(5,127) = (-0.2759463423360706, 0)
-    DEG(5,128,1) = 0
-    DEG(5,128,2) = 0
-    DEG(5,128,3) = 0
-    DEG(5,128,4) = 2
-    DEG(5,128,5) = 0
-    DEG(5,128,6) = 0
-    DEG(5,128,7) = 0
-    DEG(5,128,8) = 1
-    DEG(5,128,9) = 1
-    DEG(5,128,10) = 0
-    DEG(5,128,11) = 0
-    DEG(5,128,12) = 0
-  COEF(5,128) = (-0.5134440949139827, 0)
-    DEG(5,129,1) = 1
-    DEG(5,129,2) = 0
-    DEG(5,129,3) = 0
-    DEG(5,129,4) = 0
-    DEG(5,129,5) = 1
-    DEG(5,129,6) = 0
-    DEG(5,129,7) = 0
-    DEG(5,129,8) = 1
-    DEG(5,129,9) = 1
-    DEG(5,129,10) = 0
-    DEG(5,129,11) = 0
-    DEG(5,129,12) = 0
-  COEF(5,129) = (-0.1771148913635722, 0)
-    DEG(5,130,1) = 0
-    DEG(5,130,2) = 1
-    DEG(5,130,3) = 0
-    DEG(5,130,4) = 0
-    DEG(5,130,5) = 1
-    DEG(5,130,6) = 0
-    DEG(5,130,7) = 0
-    DEG(5,130,8) = 1
-    DEG(5,130,9) = 1
-    DEG(5,130,10) = 0
-    DEG(5,130,11) = 0
-    DEG(5,130,12) = 0
-  COEF(5,130) = (0.7922543951963256, 0)
-    DEG(5,131,1) = 0
-    DEG(5,131,2) = 0
-    DEG(5,131,3) = 1
-    DEG(5,131,4) = 0
-    DEG(5,131,5) = 1
-    DEG(5,131,6) = 0
-    DEG(5,131,7) = 0
-    DEG(5,131,8) = 1
-    DEG(5,131,9) = 1
-    DEG(5,131,10) = 0
-    DEG(5,131,11) = 0
-    DEG(5,131,12) = 0
-  COEF(5,131) = (-2.697486027241683, 0)
-    DEG(5,132,1) = 0
-    DEG(5,132,2) = 0
-    DEG(5,132,3) = 0
-    DEG(5,132,4) = 1
-    DEG(5,132,5) = 1
-    DEG(5,132,6) = 0
-    DEG(5,132,7) = 0
-    DEG(5,132,8) = 1
-    DEG(5,132,9) = 1
-    DEG(5,132,10) = 0
-    DEG(5,132,11) = 0
-    DEG(5,132,12) = 0
-  COEF(5,132) = (0.1771148913635722, 0)
-    DEG(5,133,1) = 0
-    DEG(5,133,2) = 0
-    DEG(5,133,3) = 0
-    DEG(5,133,4) = 0
-    DEG(5,133,5) = 2
-    DEG(5,133,6) = 0
-    DEG(5,133,7) = 0
-    DEG(5,133,8) = 1
-    DEG(5,133,9) = 1
-    DEG(5,133,10) = 0
-    DEG(5,133,11) = 0
-    DEG(5,133,12) = 0
-  COEF(5,133) = (-0.3961271975981628, 0)
-    DEG(5,134,1) = 1
-    DEG(5,134,2) = 0
-    DEG(5,134,3) = 0
-    DEG(5,134,4) = 0
-    DEG(5,134,5) = 0
-    DEG(5,134,6) = 1
-    DEG(5,134,7) = 0
-    DEG(5,134,8) = 1
-    DEG(5,134,9) = 1
-    DEG(5,134,10) = 0
-    DEG(5,134,11) = 0
-    DEG(5,134,12) = 0
-  COEF(5,134) = (-0.2759463423360706, 0)
-    DEG(5,135,1) = 0
-    DEG(5,135,2) = 1
-    DEG(5,135,3) = 0
-    DEG(5,135,4) = 0
-    DEG(5,135,5) = 0
-    DEG(5,135,6) = 1
-    DEG(5,135,7) = 0
-    DEG(5,135,8) = 1
-    DEG(5,135,9) = 1
-    DEG(5,135,10) = 0
-    DEG(5,135,11) = 0
-    DEG(5,135,12) = 0
-  COEF(5,135) = (-2.697486027241683, 0)
-    DEG(5,136,1) = 0
-    DEG(5,136,2) = 0
-    DEG(5,136,3) = 1
-    DEG(5,136,4) = 0
-    DEG(5,136,5) = 0
-    DEG(5,136,6) = 1
-    DEG(5,136,7) = 0
-    DEG(5,136,8) = 1
-    DEG(5,136,9) = 1
-    DEG(5,136,10) = 0
-    DEG(5,136,11) = 0
-    DEG(5,136,12) = 0
-  COEF(5,136) = (-1.819142585024291, 0)
-    DEG(5,137,1) = 0
-    DEG(5,137,2) = 0
-    DEG(5,137,3) = 0
-    DEG(5,137,4) = 1
-    DEG(5,137,5) = 0
-    DEG(5,137,6) = 1
-    DEG(5,137,7) = 0
-    DEG(5,137,8) = 1
-    DEG(5,137,9) = 1
-    DEG(5,137,10) = 0
-    DEG(5,137,11) = 0
-    DEG(5,137,12) = 0
-  COEF(5,137) = (0.2759463423360706, 0)
-    DEG(5,138,1) = 0
-    DEG(5,138,2) = 0
-    DEG(5,138,3) = 0
-    DEG(5,138,4) = 0
-    DEG(5,138,5) = 1
-    DEG(5,138,6) = 1
-    DEG(5,138,7) = 0
-    DEG(5,138,8) = 1
-    DEG(5,138,9) = 1
-    DEG(5,138,10) = 0
-    DEG(5,138,11) = 0
-    DEG(5,138,12) = 0
-  COEF(5,138) = (2.697486027241683, 0)
-    DEG(5,139,1) = 0
-    DEG(5,139,2) = 0
-    DEG(5,139,3) = 0
-    DEG(5,139,4) = 0
-    DEG(5,139,5) = 0
-    DEG(5,139,6) = 2
-    DEG(5,139,7) = 0
-    DEG(5,139,8) = 1
-    DEG(5,139,9) = 1
-    DEG(5,139,10) = 0
-    DEG(5,139,11) = 0
-    DEG(5,139,12) = 0
-  COEF(5,139) = (0.9095712925121455, 0)
-    DEG(5,140,1) = 1
-    DEG(5,140,2) = 0
-    DEG(5,140,3) = 0
-    DEG(5,140,4) = 1
-    DEG(5,140,5) = 0
-    DEG(5,140,6) = 0
-    DEG(5,140,7) = 0
-    DEG(5,140,8) = 0
-    DEG(5,140,9) = 2
-    DEG(5,140,10) = 0
-    DEG(5,140,11) = 0
-    DEG(5,140,12) = 0
-  COEF(5,140) = (0.17413677238710873, 0)
-    DEG(5,141,1) = 0
-    DEG(5,141,2) = 1
-    DEG(5,141,3) = 0
-    DEG(5,141,4) = 1
-    DEG(5,141,5) = 0
-    DEG(5,141,6) = 0
-    DEG(5,141,7) = 0
-    DEG(5,141,8) = 0
-    DEG(5,141,9) = 2
-    DEG(5,141,10) = 0
-    DEG(5,141,11) = 0
-    DEG(5,141,12) = 0
-  COEF(5,141) = (-0.6237857684530131, 0)
-    DEG(5,142,1) = 0
-    DEG(5,142,2) = 0
-    DEG(5,142,3) = 1
-    DEG(5,142,4) = 1
-    DEG(5,142,5) = 0
-    DEG(5,142,6) = 0
-    DEG(5,142,7) = 0
-    DEG(5,142,8) = 0
-    DEG(5,142,9) = 2
-    DEG(5,142,10) = 0
-    DEG(5,142,11) = 0
-    DEG(5,142,12) = 0
-  COEF(5,142) = (0.2568783953701133, 0)
-    DEG(5,143,1) = 0
-    DEG(5,143,2) = 0
-    DEG(5,143,3) = 0
-    DEG(5,143,4) = 2
-    DEG(5,143,5) = 0
-    DEG(5,143,6) = 0
-    DEG(5,143,7) = 0
-    DEG(5,143,8) = 0
-    DEG(5,143,9) = 2
-    DEG(5,143,10) = 0
-    DEG(5,143,11) = 0
-    DEG(5,143,12) = 0
-  COEF(5,143) = (-0.08706838619355436, 0)
-    DEG(5,144,1) = 1
-    DEG(5,144,2) = 0
-    DEG(5,144,3) = 0
-    DEG(5,144,4) = 0
-    DEG(5,144,5) = 1
-    DEG(5,144,6) = 0
-    DEG(5,144,7) = 0
-    DEG(5,144,8) = 0
-    DEG(5,144,9) = 2
-    DEG(5,144,10) = 0
-    DEG(5,144,11) = 0
-    DEG(5,144,12) = 0
-  COEF(5,144) = (-0.6237857684530131, 0)
-    DEG(5,145,1) = 0
-    DEG(5,145,2) = 1
-    DEG(5,145,3) = 0
-    DEG(5,145,4) = 0
-    DEG(5,145,5) = 1
-    DEG(5,145,6) = 0
-    DEG(5,145,7) = 0
-    DEG(5,145,8) = 0
-    DEG(5,145,9) = 2
-    DEG(5,145,10) = 0
-    DEG(5,145,11) = 0
-    DEG(5,145,12) = 0
-  COEF(5,145) = (1.2185358536619524, 0)
-    DEG(5,146,1) = 0
-    DEG(5,146,2) = 0
-    DEG(5,146,3) = 1
-    DEG(5,146,4) = 0
-    DEG(5,146,5) = 1
-    DEG(5,146,6) = 0
-    DEG(5,146,7) = 0
-    DEG(5,146,8) = 0
-    DEG(5,146,9) = 2
-    DEG(5,146,10) = 0
-    DEG(5,146,11) = 0
-    DEG(5,146,12) = 0
-  COEF(5,146) = (0.421420469946668, 0)
-    DEG(5,147,1) = 0
-    DEG(5,147,2) = 0
-    DEG(5,147,3) = 0
-    DEG(5,147,4) = 1
-    DEG(5,147,5) = 1
-    DEG(5,147,6) = 0
-    DEG(5,147,7) = 0
-    DEG(5,147,8) = 0
-    DEG(5,147,9) = 2
-    DEG(5,147,10) = 0
-    DEG(5,147,11) = 0
-    DEG(5,147,12) = 0
-  COEF(5,147) = (0.6237857684530131, 0)
-    DEG(5,148,1) = 0
-    DEG(5,148,2) = 0
-    DEG(5,148,3) = 0
-    DEG(5,148,4) = 0
-    DEG(5,148,5) = 2
-    DEG(5,148,6) = 0
-    DEG(5,148,7) = 0
-    DEG(5,148,8) = 0
-    DEG(5,148,9) = 2
-    DEG(5,148,10) = 0
-    DEG(5,148,11) = 0
-    DEG(5,148,12) = 0
-  COEF(5,148) = (-0.6092679268309762, 0)
-    DEG(5,149,1) = 1
-    DEG(5,149,2) = 0
-    DEG(5,149,3) = 0
-    DEG(5,149,4) = 0
-    DEG(5,149,5) = 0
-    DEG(5,149,6) = 1
-    DEG(5,149,7) = 0
-    DEG(5,149,8) = 0
-    DEG(5,149,9) = 2
-    DEG(5,149,10) = 0
-    DEG(5,149,11) = 0
-    DEG(5,149,12) = 0
-  COEF(5,149) = (0.2568783953701133, 0)
-    DEG(5,150,1) = 0
-    DEG(5,150,2) = 1
-    DEG(5,150,3) = 0
-    DEG(5,150,4) = 0
-    DEG(5,150,5) = 0
-    DEG(5,150,6) = 1
-    DEG(5,150,7) = 0
-    DEG(5,150,8) = 0
-    DEG(5,150,9) = 2
-    DEG(5,150,10) = 0
-    DEG(5,150,11) = 0
-    DEG(5,150,12) = 0
-  COEF(5,150) = (0.421420469946668, 0)
-    DEG(5,151,1) = 0
-    DEG(5,151,2) = 0
-    DEG(5,151,3) = 1
-    DEG(5,151,4) = 0
-    DEG(5,151,5) = 0
-    DEG(5,151,6) = 1
-    DEG(5,151,7) = 0
-    DEG(5,151,8) = 0
-    DEG(5,151,9) = 2
-    DEG(5,151,10) = 0
-    DEG(5,151,11) = 0
-    DEG(5,151,12) = 0
-  COEF(5,151) = (-1.392672626049061, 0)
-    DEG(5,152,1) = 0
-    DEG(5,152,2) = 0
-    DEG(5,152,3) = 0
-    DEG(5,152,4) = 1
-    DEG(5,152,5) = 0
-    DEG(5,152,6) = 1
-    DEG(5,152,7) = 0
-    DEG(5,152,8) = 0
-    DEG(5,152,9) = 2
-    DEG(5,152,10) = 0
-    DEG(5,152,11) = 0
-    DEG(5,152,12) = 0
-  COEF(5,152) = (-0.2568783953701133, 0)
-    DEG(5,153,1) = 0
-    DEG(5,153,2) = 0
-    DEG(5,153,3) = 0
-    DEG(5,153,4) = 0
-    DEG(5,153,5) = 1
-    DEG(5,153,6) = 1
-    DEG(5,153,7) = 0
-    DEG(5,153,8) = 0
-    DEG(5,153,9) = 2
-    DEG(5,153,10) = 0
-    DEG(5,153,11) = 0
-    DEG(5,153,12) = 0
-  COEF(5,153) = (-0.421420469946668, 0)
-    DEG(5,154,1) = 0
-    DEG(5,154,2) = 0
-    DEG(5,154,3) = 0
-    DEG(5,154,4) = 0
-    DEG(5,154,5) = 0
-    DEG(5,154,6) = 2
-    DEG(5,154,7) = 0
-    DEG(5,154,8) = 0
-    DEG(5,154,9) = 2
-    DEG(5,154,10) = 0
-    DEG(5,154,11) = 0
-    DEG(5,154,12) = 0
-  COEF(5,154) = (0.6963363130245305, 0)
-    DEG(5,155,1) = 0
-    DEG(5,155,2) = 0
-    DEG(5,155,3) = 0
-    DEG(5,155,4) = 0
-    DEG(5,155,5) = 0
-    DEG(5,155,6) = 0
-    DEG(5,155,7) = 0
-    DEG(5,155,8) = 0
-    DEG(5,155,9) = 0
-    DEG(5,155,10) = 1
-    DEG(5,155,11) = 0
-    DEG(5,155,12) = 0
-  COEF(5,155) = (-3.603125174980633, 0)
-    DEG(5,156,1) = 1
-    DEG(5,156,2) = 0
-    DEG(5,156,3) = 0
-    DEG(5,156,4) = 1
-    DEG(5,156,5) = 0
-    DEG(5,156,6) = 0
-    DEG(5,156,7) = 0
-    DEG(5,156,8) = 0
-    DEG(5,156,9) = 0
-    DEG(5,156,10) = 1
-    DEG(5,156,11) = 0
-    DEG(5,156,12) = 0
-  COEF(5,156) = (3.603125174980633, 0)
-    DEG(5,157,1) = 1
-    DEG(5,157,2) = 0
-    DEG(5,157,3) = 0
-    DEG(5,157,4) = 0
-    DEG(5,157,5) = 1
-    DEG(5,157,6) = 0
-    DEG(5,157,7) = 0
-    DEG(5,157,8) = 0
-    DEG(5,157,9) = 0
-    DEG(5,157,10) = 1
-    DEG(5,157,11) = 0
-    DEG(5,157,12) = 0
-  COEF(5,157) = (-1.3774125050587993, 0)
-    DEG(5,158,1) = 1
-    DEG(5,158,2) = 0
-    DEG(5,158,3) = 0
-    DEG(5,158,4) = 0
-    DEG(5,158,5) = 0
-    DEG(5,158,6) = 1
-    DEG(5,158,7) = 0
-    DEG(5,158,8) = 0
-    DEG(5,158,9) = 0
-    DEG(5,158,10) = 1
-    DEG(5,158,11) = 0
-    DEG(5,158,12) = 0
-  COEF(5,158) = (-0.02766405857500134, 0)
-    DEG(5,159,1) = 0
-    DEG(5,159,2) = 0
-    DEG(5,159,3) = 0
-    DEG(5,159,4) = 0
-    DEG(5,159,5) = 0
-    DEG(5,159,6) = 0
-    DEG(5,159,7) = 1
-    DEG(5,159,8) = 0
-    DEG(5,159,9) = 0
-    DEG(5,159,10) = 1
-    DEG(5,159,11) = 0
-    DEG(5,159,12) = 0
-  COEF(5,159) = (-0.2173758865299823, 0)
-    DEG(5,160,1) = 1
-    DEG(5,160,2) = 0
-    DEG(5,160,3) = 0
-    DEG(5,160,4) = 1
-    DEG(5,160,5) = 0
-    DEG(5,160,6) = 0
-    DEG(5,160,7) = 1
-    DEG(5,160,8) = 0
-    DEG(5,160,9) = 0
-    DEG(5,160,10) = 1
-    DEG(5,160,11) = 0
-    DEG(5,160,12) = 0
-  COEF(5,160) = (0.2173758865299823, 0)
-    DEG(5,161,1) = 1
-    DEG(5,161,2) = 0
-    DEG(5,161,3) = 0
-    DEG(5,161,4) = 0
-    DEG(5,161,5) = 1
-    DEG(5,161,6) = 0
-    DEG(5,161,7) = 1
-    DEG(5,161,8) = 0
-    DEG(5,161,9) = 0
-    DEG(5,161,10) = 1
-    DEG(5,161,11) = 0
-    DEG(5,161,12) = 0
-  COEF(5,161) = (2.017267717716503, 0)
-    DEG(5,162,1) = 1
-    DEG(5,162,2) = 0
-    DEG(5,162,3) = 0
-    DEG(5,162,4) = 0
-    DEG(5,162,5) = 0
-    DEG(5,162,6) = 1
-    DEG(5,162,7) = 1
-    DEG(5,162,8) = 0
-    DEG(5,162,9) = 0
-    DEG(5,162,10) = 1
-    DEG(5,162,11) = 0
-    DEG(5,162,12) = 0
-  COEF(5,162) = (-0.6176233687635143, 0)
-    DEG(5,163,1) = 0
-    DEG(5,163,2) = 0
-    DEG(5,163,3) = 0
-    DEG(5,163,4) = 0
-    DEG(5,163,5) = 0
-    DEG(5,163,6) = 0
-    DEG(5,163,7) = 0
-    DEG(5,163,8) = 1
-    DEG(5,163,9) = 0
-    DEG(5,163,10) = 1
-    DEG(5,163,11) = 0
-    DEG(5,163,12) = 0
-  COEF(5,163) = (0.7544437735702717, 0)
-    DEG(5,164,1) = 1
-    DEG(5,164,2) = 0
-    DEG(5,164,3) = 0
-    DEG(5,164,4) = 1
-    DEG(5,164,5) = 0
-    DEG(5,164,6) = 0
-    DEG(5,164,7) = 0
-    DEG(5,164,8) = 1
-    DEG(5,164,9) = 0
-    DEG(5,164,10) = 1
-    DEG(5,164,11) = 0
-    DEG(5,164,12) = 0
-  COEF(5,164) = (-0.7544437735702717, 0)
-    DEG(5,165,1) = 1
-    DEG(5,165,2) = 0
-    DEG(5,165,3) = 0
-    DEG(5,165,4) = 0
-    DEG(5,165,5) = 1
-    DEG(5,165,6) = 0
-    DEG(5,165,7) = 0
-    DEG(5,165,8) = 1
-    DEG(5,165,9) = 0
-    DEG(5,165,10) = 1
-    DEG(5,165,11) = 0
-    DEG(5,165,12) = 0
-  COEF(5,165) = (-2.4430999123062884, 0)
-    DEG(5,166,1) = 1
-    DEG(5,166,2) = 0
-    DEG(5,166,3) = 0
-    DEG(5,166,4) = 0
-    DEG(5,166,5) = 0
-    DEG(5,166,6) = 1
-    DEG(5,166,7) = 0
-    DEG(5,166,8) = 1
-    DEG(5,166,9) = 0
-    DEG(5,166,10) = 1
-    DEG(5,166,11) = 0
-    DEG(5,166,12) = 0
-  COEF(5,166) = (1.6519248196808733, 0)
-    DEG(5,167,1) = 0
-    DEG(5,167,2) = 0
-    DEG(5,167,3) = 0
-    DEG(5,167,4) = 0
-    DEG(5,167,5) = 0
-    DEG(5,167,6) = 0
-    DEG(5,167,7) = 0
-    DEG(5,167,8) = 0
-    DEG(5,167,9) = 1
-    DEG(5,167,10) = 1
-    DEG(5,167,11) = 0
-    DEG(5,167,12) = 0
-  COEF(5,167) = (-1.5734131715327728, 0)
-    DEG(5,168,1) = 1
-    DEG(5,168,2) = 0
-    DEG(5,168,3) = 0
-    DEG(5,168,4) = 1
-    DEG(5,168,5) = 0
-    DEG(5,168,6) = 0
-    DEG(5,168,7) = 0
-    DEG(5,168,8) = 0
-    DEG(5,168,9) = 1
-    DEG(5,168,10) = 1
-    DEG(5,168,11) = 0
-    DEG(5,168,12) = 0
-  COEF(5,168) = (1.5734131715327728, 0)
-    DEG(5,169,1) = 1
-    DEG(5,169,2) = 0
-    DEG(5,169,3) = 0
-    DEG(5,169,4) = 0
-    DEG(5,169,5) = 1
-    DEG(5,169,6) = 0
-    DEG(5,169,7) = 0
-    DEG(5,169,8) = 0
-    DEG(5,169,9) = 1
-    DEG(5,169,10) = 1
-    DEG(5,169,11) = 0
-    DEG(5,169,12) = 0
-  COEF(5,169) = (-1.8357519863751328, 0)
-    DEG(5,170,1) = 1
-    DEG(5,170,2) = 0
-    DEG(5,170,3) = 0
-    DEG(5,170,4) = 0
-    DEG(5,170,5) = 0
-    DEG(5,170,6) = 1
-    DEG(5,170,7) = 0
-    DEG(5,170,8) = 0
-    DEG(5,170,9) = 1
-    DEG(5,170,10) = 1
-    DEG(5,170,11) = 0
-    DEG(5,170,12) = 0
-  COEF(5,170) = (-2.69755991699311, 0)
-    DEG(5,171,1) = 0
-    DEG(5,171,2) = 0
-    DEG(5,171,3) = 0
-    DEG(5,171,4) = 0
-    DEG(5,171,5) = 0
-    DEG(5,171,6) = 0
-    DEG(5,171,7) = 0
-    DEG(5,171,8) = 0
-    DEG(5,171,9) = 0
-    DEG(5,171,10) = 0
-    DEG(5,171,11) = 1
-    DEG(5,171,12) = 0
-  COEF(5,171) = (1.3774125050587993, 0)
-    DEG(5,172,1) = 0
-    DEG(5,172,2) = 1
-    DEG(5,172,3) = 0
-    DEG(5,172,4) = 1
-    DEG(5,172,5) = 0
-    DEG(5,172,6) = 0
-    DEG(5,172,7) = 0
-    DEG(5,172,8) = 0
-    DEG(5,172,9) = 0
-    DEG(5,172,10) = 0
-    DEG(5,172,11) = 1
-    DEG(5,172,12) = 0
-  COEF(5,172) = (3.603125174980633, 0)
-    DEG(5,173,1) = 0
-    DEG(5,173,2) = 1
-    DEG(5,173,3) = 0
-    DEG(5,173,4) = 0
-    DEG(5,173,5) = 1
-    DEG(5,173,6) = 0
-    DEG(5,173,7) = 0
-    DEG(5,173,8) = 0
-    DEG(5,173,9) = 0
-    DEG(5,173,10) = 0
-    DEG(5,173,11) = 1
-    DEG(5,173,12) = 0
-  COEF(5,173) = (-1.3774125050587993, 0)
-    DEG(5,174,1) = 0
-    DEG(5,174,2) = 1
-    DEG(5,174,3) = 0
-    DEG(5,174,4) = 0
-    DEG(5,174,5) = 0
-    DEG(5,174,6) = 1
-    DEG(5,174,7) = 0
-    DEG(5,174,8) = 0
-    DEG(5,174,9) = 0
-    DEG(5,174,10) = 0
-    DEG(5,174,11) = 1
-    DEG(5,174,12) = 0
-  COEF(5,174) = (-0.02766405857500134, 0)
-    DEG(5,175,1) = 0
-    DEG(5,175,2) = 0
-    DEG(5,175,3) = 0
-    DEG(5,175,4) = 0
-    DEG(5,175,5) = 0
-    DEG(5,175,6) = 0
-    DEG(5,175,7) = 1
-    DEG(5,175,8) = 0
-    DEG(5,175,9) = 0
-    DEG(5,175,10) = 0
-    DEG(5,175,11) = 1
-    DEG(5,175,12) = 0
-  COEF(5,175) = (-2.017267717716503, 0)
-    DEG(5,176,1) = 0
-    DEG(5,176,2) = 1
-    DEG(5,176,3) = 0
-    DEG(5,176,4) = 1
-    DEG(5,176,5) = 0
-    DEG(5,176,6) = 0
-    DEG(5,176,7) = 1
-    DEG(5,176,8) = 0
-    DEG(5,176,9) = 0
-    DEG(5,176,10) = 0
-    DEG(5,176,11) = 1
-    DEG(5,176,12) = 0
-  COEF(5,176) = (0.2173758865299823, 0)
-    DEG(5,177,1) = 0
-    DEG(5,177,2) = 1
-    DEG(5,177,3) = 0
-    DEG(5,177,4) = 0
-    DEG(5,177,5) = 1
-    DEG(5,177,6) = 0
-    DEG(5,177,7) = 1
-    DEG(5,177,8) = 0
-    DEG(5,177,9) = 0
-    DEG(5,177,10) = 0
-    DEG(5,177,11) = 1
-    DEG(5,177,12) = 0
-  COEF(5,177) = (2.017267717716503, 0)
-    DEG(5,178,1) = 0
-    DEG(5,178,2) = 1
-    DEG(5,178,3) = 0
-    DEG(5,178,4) = 0
-    DEG(5,178,5) = 0
-    DEG(5,178,6) = 1
-    DEG(5,178,7) = 1
-    DEG(5,178,8) = 0
-    DEG(5,178,9) = 0
-    DEG(5,178,10) = 0
-    DEG(5,178,11) = 1
-    DEG(5,178,12) = 0
-  COEF(5,178) = (-0.6176233687635143, 0)
-    DEG(5,179,1) = 0
-    DEG(5,179,2) = 0
-    DEG(5,179,3) = 0
-    DEG(5,179,4) = 0
-    DEG(5,179,5) = 0
-    DEG(5,179,6) = 0
-    DEG(5,179,7) = 0
-    DEG(5,179,8) = 1
-    DEG(5,179,9) = 0
-    DEG(5,179,10) = 0
-    DEG(5,179,11) = 1
-    DEG(5,179,12) = 0
-  COEF(5,179) = (2.4430999123062884, 0)
-    DEG(5,180,1) = 0
-    DEG(5,180,2) = 1
-    DEG(5,180,3) = 0
-    DEG(5,180,4) = 1
-    DEG(5,180,5) = 0
-    DEG(5,180,6) = 0
-    DEG(5,180,7) = 0
-    DEG(5,180,8) = 1
-    DEG(5,180,9) = 0
-    DEG(5,180,10) = 0
-    DEG(5,180,11) = 1
-    DEG(5,180,12) = 0
-  COEF(5,180) = (-0.7544437735702717, 0)
-    DEG(5,181,1) = 0
-    DEG(5,181,2) = 1
-    DEG(5,181,3) = 0
-    DEG(5,181,4) = 0
-    DEG(5,181,5) = 1
-    DEG(5,181,6) = 0
-    DEG(5,181,7) = 0
-    DEG(5,181,8) = 1
-    DEG(5,181,9) = 0
-    DEG(5,181,10) = 0
-    DEG(5,181,11) = 1
-    DEG(5,181,12) = 0
-  COEF(5,181) = (-2.4430999123062884, 0)
-    DEG(5,182,1) = 0
-    DEG(5,182,2) = 1
-    DEG(5,182,3) = 0
-    DEG(5,182,4) = 0
-    DEG(5,182,5) = 0
-    DEG(5,182,6) = 1
-    DEG(5,182,7) = 0
-    DEG(5,182,8) = 1
-    DEG(5,182,9) = 0
-    DEG(5,182,10) = 0
-    DEG(5,182,11) = 1
-    DEG(5,182,12) = 0
-  COEF(5,182) = (1.6519248196808733, 0)
-    DEG(5,183,1) = 0
-    DEG(5,183,2) = 0
-    DEG(5,183,3) = 0
-    DEG(5,183,4) = 0
-    DEG(5,183,5) = 0
-    DEG(5,183,6) = 0
-    DEG(5,183,7) = 0
-    DEG(5,183,8) = 0
-    DEG(5,183,9) = 1
-    DEG(5,183,10) = 0
-    DEG(5,183,11) = 1
-    DEG(5,183,12) = 0
-  COEF(5,183) = (1.8357519863751328, 0)
-    DEG(5,184,1) = 0
-    DEG(5,184,2) = 1
-    DEG(5,184,3) = 0
-    DEG(5,184,4) = 1
-    DEG(5,184,5) = 0
-    DEG(5,184,6) = 0
-    DEG(5,184,7) = 0
-    DEG(5,184,8) = 0
-    DEG(5,184,9) = 1
-    DEG(5,184,10) = 0
-    DEG(5,184,11) = 1
-    DEG(5,184,12) = 0
-  COEF(5,184) = (1.5734131715327728, 0)
-    DEG(5,185,1) = 0
-    DEG(5,185,2) = 1
-    DEG(5,185,3) = 0
-    DEG(5,185,4) = 0
-    DEG(5,185,5) = 1
-    DEG(5,185,6) = 0
-    DEG(5,185,7) = 0
-    DEG(5,185,8) = 0
-    DEG(5,185,9) = 1
-    DEG(5,185,10) = 0
-    DEG(5,185,11) = 1
-    DEG(5,185,12) = 0
-  COEF(5,185) = (-1.8357519863751328, 0)
-    DEG(5,186,1) = 0
-    DEG(5,186,2) = 1
-    DEG(5,186,3) = 0
-    DEG(5,186,4) = 0
-    DEG(5,186,5) = 0
-    DEG(5,186,6) = 1
-    DEG(5,186,7) = 0
-    DEG(5,186,8) = 0
-    DEG(5,186,9) = 1
-    DEG(5,186,10) = 0
-    DEG(5,186,11) = 1
-    DEG(5,186,12) = 0
-  COEF(5,186) = (-2.69755991699311, 0)
-    DEG(5,187,1) = 0
-    DEG(5,187,2) = 0
-    DEG(5,187,3) = 0
-    DEG(5,187,4) = 0
-    DEG(5,187,5) = 0
-    DEG(5,187,6) = 0
-    DEG(5,187,7) = 0
-    DEG(5,187,8) = 0
-    DEG(5,187,9) = 0
-    DEG(5,187,10) = 0
-    DEG(5,187,11) = 0
-    DEG(5,187,12) = 1
-  COEF(5,187) = (0.02766405857500134, 0)
-    DEG(5,188,1) = 0
-    DEG(5,188,2) = 0
-    DEG(5,188,3) = 1
-    DEG(5,188,4) = 1
-    DEG(5,188,5) = 0
-    DEG(5,188,6) = 0
-    DEG(5,188,7) = 0
-    DEG(5,188,8) = 0
-    DEG(5,188,9) = 0
-    DEG(5,188,10) = 0
-    DEG(5,188,11) = 0
-    DEG(5,188,12) = 1
-  COEF(5,188) = (3.603125174980633, 0)
-    DEG(5,189,1) = 0
-    DEG(5,189,2) = 0
-    DEG(5,189,3) = 1
-    DEG(5,189,4) = 0
-    DEG(5,189,5) = 1
-    DEG(5,189,6) = 0
-    DEG(5,189,7) = 0
-    DEG(5,189,8) = 0
-    DEG(5,189,9) = 0
-    DEG(5,189,10) = 0
-    DEG(5,189,11) = 0
-    DEG(5,189,12) = 1
-  COEF(5,189) = (-1.3774125050587993, 0)
-    DEG(5,190,1) = 0
-    DEG(5,190,2) = 0
-    DEG(5,190,3) = 1
-    DEG(5,190,4) = 0
-    DEG(5,190,5) = 0
-    DEG(5,190,6) = 1
-    DEG(5,190,7) = 0
-    DEG(5,190,8) = 0
-    DEG(5,190,9) = 0
-    DEG(5,190,10) = 0
-    DEG(5,190,11) = 0
-    DEG(5,190,12) = 1
-  COEF(5,190) = (-0.02766405857500134, 0)
-    DEG(5,191,1) = 0
-    DEG(5,191,2) = 0
-    DEG(5,191,3) = 0
-    DEG(5,191,4) = 0
-    DEG(5,191,5) = 0
-    DEG(5,191,6) = 0
-    DEG(5,191,7) = 1
-    DEG(5,191,8) = 0
-    DEG(5,191,9) = 0
-    DEG(5,191,10) = 0
-    DEG(5,191,11) = 0
-    DEG(5,191,12) = 1
-  COEF(5,191) = (0.6176233687635143, 0)
-    DEG(5,192,1) = 0
-    DEG(5,192,2) = 0
-    DEG(5,192,3) = 1
-    DEG(5,192,4) = 1
-    DEG(5,192,5) = 0
-    DEG(5,192,6) = 0
-    DEG(5,192,7) = 1
-    DEG(5,192,8) = 0
-    DEG(5,192,9) = 0
-    DEG(5,192,10) = 0
-    DEG(5,192,11) = 0
-    DEG(5,192,12) = 1
-  COEF(5,192) = (0.2173758865299823, 0)
-    DEG(5,193,1) = 0
-    DEG(5,193,2) = 0
-    DEG(5,193,3) = 1
-    DEG(5,193,4) = 0
-    DEG(5,193,5) = 1
-    DEG(5,193,6) = 0
-    DEG(5,193,7) = 1
-    DEG(5,193,8) = 0
-    DEG(5,193,9) = 0
-    DEG(5,193,10) = 0
-    DEG(5,193,11) = 0
-    DEG(5,193,12) = 1
-  COEF(5,193) = (2.017267717716503, 0)
-    DEG(5,194,1) = 0
-    DEG(5,194,2) = 0
-    DEG(5,194,3) = 1
-    DEG(5,194,4) = 0
-    DEG(5,194,5) = 0
-    DEG(5,194,6) = 1
-    DEG(5,194,7) = 1
-    DEG(5,194,8) = 0
-    DEG(5,194,9) = 0
-    DEG(5,194,10) = 0
-    DEG(5,194,11) = 0
-    DEG(5,194,12) = 1
-  COEF(5,194) = (-0.6176233687635143, 0)
-    DEG(5,195,1) = 0
-    DEG(5,195,2) = 0
-    DEG(5,195,3) = 0
-    DEG(5,195,4) = 0
-    DEG(5,195,5) = 0
-    DEG(5,195,6) = 0
-    DEG(5,195,7) = 0
-    DEG(5,195,8) = 1
-    DEG(5,195,9) = 0
-    DEG(5,195,10) = 0
-    DEG(5,195,11) = 0
-    DEG(5,195,12) = 1
-  COEF(5,195) = (-1.6519248196808733, 0)
-    DEG(5,196,1) = 0
-    DEG(5,196,2) = 0
-    DEG(5,196,3) = 1
-    DEG(5,196,4) = 1
-    DEG(5,196,5) = 0
-    DEG(5,196,6) = 0
-    DEG(5,196,7) = 0
-    DEG(5,196,8) = 1
-    DEG(5,196,9) = 0
-    DEG(5,196,10) = 0
-    DEG(5,196,11) = 0
-    DEG(5,196,12) = 1
-  COEF(5,196) = (-0.7544437735702717, 0)
-    DEG(5,197,1) = 0
-    DEG(5,197,2) = 0
-    DEG(5,197,3) = 1
-    DEG(5,197,4) = 0
-    DEG(5,197,5) = 1
-    DEG(5,197,6) = 0
-    DEG(5,197,7) = 0
-    DEG(5,197,8) = 1
-    DEG(5,197,9) = 0
-    DEG(5,197,10) = 0
-    DEG(5,197,11) = 0
-    DEG(5,197,12) = 1
-  COEF(5,197) = (-2.4430999123062884, 0)
-    DEG(5,198,1) = 0
-    DEG(5,198,2) = 0
-    DEG(5,198,3) = 1
-    DEG(5,198,4) = 0
-    DEG(5,198,5) = 0
-    DEG(5,198,6) = 1
-    DEG(5,198,7) = 0
-    DEG(5,198,8) = 1
-    DEG(5,198,9) = 0
-    DEG(5,198,10) = 0
-    DEG(5,198,11) = 0
-    DEG(5,198,12) = 1
-  COEF(5,198) = (1.6519248196808733, 0)
-    DEG(5,199,1) = 0
-    DEG(5,199,2) = 0
-    DEG(5,199,3) = 0
-    DEG(5,199,4) = 0
-    DEG(5,199,5) = 0
-    DEG(5,199,6) = 0
-    DEG(5,199,7) = 0
-    DEG(5,199,8) = 0
-    DEG(5,199,9) = 1
-    DEG(5,199,10) = 0
-    DEG(5,199,11) = 0
-    DEG(5,199,12) = 1
-  COEF(5,199) = (2.69755991699311, 0)
-    DEG(5,200,1) = 0
-    DEG(5,200,2) = 0
-    DEG(5,200,3) = 1
-    DEG(5,200,4) = 1
-    DEG(5,200,5) = 0
-    DEG(5,200,6) = 0
-    DEG(5,200,7) = 0
-    DEG(5,200,8) = 0
-    DEG(5,200,9) = 1
-    DEG(5,200,10) = 0
-    DEG(5,200,11) = 0
-    DEG(5,200,12) = 1
-  COEF(5,200) = (1.5734131715327728, 0)
-    DEG(5,201,1) = 0
-    DEG(5,201,2) = 0
-    DEG(5,201,3) = 1
-    DEG(5,201,4) = 0
-    DEG(5,201,5) = 1
-    DEG(5,201,6) = 0
-    DEG(5,201,7) = 0
-    DEG(5,201,8) = 0
-    DEG(5,201,9) = 1
-    DEG(5,201,10) = 0
-    DEG(5,201,11) = 0
-    DEG(5,201,12) = 1
-  COEF(5,201) = (-1.8357519863751328, 0)
-    DEG(5,202,1) = 0
-    DEG(5,202,2) = 0
-    DEG(5,202,3) = 1
-    DEG(5,202,4) = 0
-    DEG(5,202,5) = 0
-    DEG(5,202,6) = 1
-    DEG(5,202,7) = 0
-    DEG(5,202,8) = 0
-    DEG(5,202,9) = 1
-    DEG(5,202,10) = 0
-    DEG(5,202,11) = 0
-    DEG(5,202,12) = 1
-  COEF(5,202) = (-2.69755991699311, 0)
-
-NUM_TERMS(6) = 202
-    DEG(6,1,1) = 0
-    DEG(6,1,2) = 0
-    DEG(6,1,3) = 0
-    DEG(6,1,4) = 0
-    DEG(6,1,5) = 0
-    DEG(6,1,6) = 0
-    DEG(6,1,7) = 0
-    DEG(6,1,8) = 0
-    DEG(6,1,9) = 0
-    DEG(6,1,10) = 0
-    DEG(6,1,11) = 0
-    DEG(6,1,12) = 0
-  COEF(6,1) = (0.10480237283467528, 0)
-    DEG(6,2,1) = 1
-    DEG(6,2,2) = 0
-    DEG(6,2,3) = 0
-    DEG(6,2,4) = 1
-    DEG(6,2,5) = 0
-    DEG(6,2,6) = 0
-    DEG(6,2,7) = 0
-    DEG(6,2,8) = 0
-    DEG(6,2,9) = 0
-    DEG(6,2,10) = 0
-    DEG(6,2,11) = 0
-    DEG(6,2,12) = 0
-  COEF(6,2) = (0.992002169445445, 0)
-    DEG(6,3,1) = 0
-    DEG(6,3,2) = 1
-    DEG(6,3,3) = 0
-    DEG(6,3,4) = 1
-    DEG(6,3,5) = 0
-    DEG(6,3,6) = 0
-    DEG(6,3,7) = 0
-    DEG(6,3,8) = 0
-    DEG(6,3,9) = 0
-    DEG(6,3,10) = 0
-    DEG(6,3,11) = 0
-    DEG(6,3,12) = 0
-  COEF(6,3) = (-0.10547746884757656, 0)
-    DEG(6,4,1) = 0
-    DEG(6,4,2) = 0
-    DEG(6,4,3) = 1
-    DEG(6,4,4) = 1
-    DEG(6,4,5) = 0
-    DEG(6,4,6) = 0
-    DEG(6,4,7) = 0
-    DEG(6,4,8) = 0
-    DEG(6,4,9) = 0
-    DEG(6,4,10) = 0
-    DEG(6,4,11) = 0
-    DEG(6,4,12) = 0
-  COEF(6,4) = (-1.3070420696824185, 0)
-    DEG(6,5,1) = 0
-    DEG(6,5,2) = 0
-    DEG(6,5,3) = 0
-    DEG(6,5,4) = 2
-    DEG(6,5,5) = 0
-    DEG(6,5,6) = 0
-    DEG(6,5,7) = 0
-    DEG(6,5,8) = 0
-    DEG(6,5,9) = 0
-    DEG(6,5,10) = 0
-    DEG(6,5,11) = 0
-    DEG(6,5,12) = 0
-  COEF(6,5) = (-0.4960010847227225, 0)
-    DEG(6,6,1) = 1
-    DEG(6,6,2) = 0
-    DEG(6,6,3) = 0
-    DEG(6,6,4) = 0
-    DEG(6,6,5) = 1
-    DEG(6,6,6) = 0
-    DEG(6,6,7) = 0
-    DEG(6,6,8) = 0
-    DEG(6,6,9) = 0
-    DEG(6,6,10) = 0
-    DEG(6,6,11) = 0
-    DEG(6,6,12) = 0
-  COEF(6,6) = (-0.10547746884757656, 0)
-    DEG(6,7,1) = 0
-    DEG(6,7,2) = 1
-    DEG(6,7,3) = 0
-    DEG(6,7,4) = 0
-    DEG(6,7,5) = 1
-    DEG(6,7,6) = 0
-    DEG(6,7,7) = 0
-    DEG(6,7,8) = 0
-    DEG(6,7,9) = 0
-    DEG(6,7,10) = 0
-    DEG(6,7,11) = 0
-    DEG(6,7,12) = 0
-  COEF(6,7) = (0.0025188582582561857, 0)
-    DEG(6,8,1) = 0
-    DEG(6,8,2) = 0
-    DEG(6,8,3) = 1
-    DEG(6,8,4) = 0
-    DEG(6,8,5) = 1
-    DEG(6,8,6) = 0
-    DEG(6,8,7) = 0
-    DEG(6,8,8) = 0
-    DEG(6,8,9) = 0
-    DEG(6,8,10) = 0
-    DEG(6,8,11) = 0
-    DEG(6,8,12) = 0
-  COEF(6,8) = (-0.020548432656899162, 0)
-    DEG(6,9,1) = 0
-    DEG(6,9,2) = 0
-    DEG(6,9,3) = 0
-    DEG(6,9,4) = 1
-    DEG(6,9,5) = 1
-    DEG(6,9,6) = 0
-    DEG(6,9,7) = 0
-    DEG(6,9,8) = 0
-    DEG(6,9,9) = 0
-    DEG(6,9,10) = 0
-    DEG(6,9,11) = 0
-    DEG(6,9,12) = 0
-  COEF(6,9) = (0.10547746884757656, 0)
-    DEG(6,10,1) = 0
-    DEG(6,10,2) = 0
-    DEG(6,10,3) = 0
-    DEG(6,10,4) = 0
-    DEG(6,10,5) = 2
-    DEG(6,10,6) = 0
-    DEG(6,10,7) = 0
-    DEG(6,10,8) = 0
-    DEG(6,10,9) = 0
-    DEG(6,10,10) = 0
-    DEG(6,10,11) = 0
-    DEG(6,10,12) = 0
-  COEF(6,10) = (-0.0012594291291280928, 0)
-    DEG(6,11,1) = 1
-    DEG(6,11,2) = 0
-    DEG(6,11,3) = 0
-    DEG(6,11,4) = 0
-    DEG(6,11,5) = 0
-    DEG(6,11,6) = 1
-    DEG(6,11,7) = 0
-    DEG(6,11,8) = 0
-    DEG(6,11,9) = 0
-    DEG(6,11,10) = 0
-    DEG(6,11,11) = 0
-    DEG(6,11,12) = 0
-  COEF(6,11) = (-1.3070420696824185, 0)
-    DEG(6,12,1) = 0
-    DEG(6,12,2) = 1
-    DEG(6,12,3) = 0
-    DEG(6,12,4) = 0
-    DEG(6,12,5) = 0
-    DEG(6,12,6) = 1
-    DEG(6,12,7) = 0
-    DEG(6,12,8) = 0
-    DEG(6,12,9) = 0
-    DEG(6,12,10) = 0
-    DEG(6,12,11) = 0
-    DEG(6,12,12) = 0
-  COEF(6,12) = (-0.020548432656899162, 0)
-    DEG(6,13,1) = 0
-    DEG(6,13,2) = 0
-    DEG(6,13,3) = 1
-    DEG(6,13,4) = 0
-    DEG(6,13,5) = 0
-    DEG(6,13,6) = 1
-    DEG(6,13,7) = 0
-    DEG(6,13,8) = 0
-    DEG(6,13,9) = 0
-    DEG(6,13,10) = 0
-    DEG(6,13,11) = 0
-    DEG(6,13,12) = 0
-  COEF(6,13) = (-1.2041257733730517, 0)
-    DEG(6,14,1) = 0
-    DEG(6,14,2) = 0
-    DEG(6,14,3) = 0
-    DEG(6,14,4) = 1
-    DEG(6,14,5) = 0
-    DEG(6,14,6) = 1
-    DEG(6,14,7) = 0
-    DEG(6,14,8) = 0
-    DEG(6,14,9) = 0
-    DEG(6,14,10) = 0
-    DEG(6,14,11) = 0
-    DEG(6,14,12) = 0
-  COEF(6,14) = (1.3070420696824185, 0)
-    DEG(6,15,1) = 0
-    DEG(6,15,2) = 0
-    DEG(6,15,3) = 0
-    DEG(6,15,4) = 0
-    DEG(6,15,5) = 1
-    DEG(6,15,6) = 1
-    DEG(6,15,7) = 0
-    DEG(6,15,8) = 0
-    DEG(6,15,9) = 0
-    DEG(6,15,10) = 0
-    DEG(6,15,11) = 0
-    DEG(6,15,12) = 0
-  COEF(6,15) = (0.020548432656899162, 0)
-    DEG(6,16,1) = 0
-    DEG(6,16,2) = 0
-    DEG(6,16,3) = 0
-    DEG(6,16,4) = 0
-    DEG(6,16,5) = 0
-    DEG(6,16,6) = 2
-    DEG(6,16,7) = 0
-    DEG(6,16,8) = 0
-    DEG(6,16,9) = 0
-    DEG(6,16,10) = 0
-    DEG(6,16,11) = 0
-    DEG(6,16,12) = 0
-  COEF(6,16) = (0.6020628866865259, 0)
-    DEG(6,17,1) = 0
-    DEG(6,17,2) = 0
-    DEG(6,17,3) = 0
-    DEG(6,17,4) = 0
-    DEG(6,17,5) = 0
-    DEG(6,17,6) = 0
-    DEG(6,17,7) = 1
-    DEG(6,17,8) = 0
-    DEG(6,17,9) = 0
-    DEG(6,17,10) = 0
-    DEG(6,17,11) = 0
-    DEG(6,17,12) = 0
-  COEF(6,17) = (-2.1403566205495395, 0)
-    DEG(6,18,1) = 1
-    DEG(6,18,2) = 0
-    DEG(6,18,3) = 0
-    DEG(6,18,4) = 1
-    DEG(6,18,5) = 0
-    DEG(6,18,6) = 0
-    DEG(6,18,7) = 1
-    DEG(6,18,8) = 0
-    DEG(6,18,9) = 0
-    DEG(6,18,10) = 0
-    DEG(6,18,11) = 0
-    DEG(6,18,12) = 0
-  COEF(6,18) = (5.386871686517307, 0)
-    DEG(6,19,1) = 0
-    DEG(6,19,2) = 1
-    DEG(6,19,3) = 0
-    DEG(6,19,4) = 1
-    DEG(6,19,5) = 0
-    DEG(6,19,6) = 0
-    DEG(6,19,7) = 1
-    DEG(6,19,8) = 0
-    DEG(6,19,9) = 0
-    DEG(6,19,10) = 0
-    DEG(6,19,11) = 0
-    DEG(6,19,12) = 0
-  COEF(6,19) = (1.8087339514516672, 0)
-    DEG(6,20,1) = 0
-    DEG(6,20,2) = 0
-    DEG(6,20,3) = 1
-    DEG(6,20,4) = 1
-    DEG(6,20,5) = 0
-    DEG(6,20,6) = 0
-    DEG(6,20,7) = 1
-    DEG(6,20,8) = 0
-    DEG(6,20,9) = 0
-    DEG(6,20,10) = 0
-    DEG(6,20,11) = 0
-    DEG(6,20,12) = 0
-  COEF(6,20) = (0.4890823446028041, 0)
-    DEG(6,21,1) = 0
-    DEG(6,21,2) = 0
-    DEG(6,21,3) = 0
-    DEG(6,21,4) = 2
-    DEG(6,21,5) = 0
-    DEG(6,21,6) = 0
-    DEG(6,21,7) = 1
-    DEG(6,21,8) = 0
-    DEG(6,21,9) = 0
-    DEG(6,21,10) = 0
-    DEG(6,21,11) = 0
-    DEG(6,21,12) = 0
-  COEF(6,21) = (-2.6934358432586536, 0)
-    DEG(6,22,1) = 1
-    DEG(6,22,2) = 0
-    DEG(6,22,3) = 0
-    DEG(6,22,4) = 0
-    DEG(6,22,5) = 1
-    DEG(6,22,6) = 0
-    DEG(6,22,7) = 1
-    DEG(6,22,8) = 0
-    DEG(6,22,9) = 0
-    DEG(6,22,10) = 0
-    DEG(6,22,11) = 0
-    DEG(6,22,12) = 0
-  COEF(6,22) = (1.8087339514516672, 0)
-    DEG(6,23,1) = 0
-    DEG(6,23,2) = 1
-    DEG(6,23,3) = 0
-    DEG(6,23,4) = 0
-    DEG(6,23,5) = 1
-    DEG(6,23,6) = 0
-    DEG(6,23,7) = 1
-    DEG(6,23,8) = 0
-    DEG(6,23,9) = 0
-    DEG(6,23,10) = 0
-    DEG(6,23,11) = 0
-    DEG(6,23,12) = 0
-  COEF(6,23) = (-0.027881517902805616, 0)
-    DEG(6,24,1) = 0
-    DEG(6,24,2) = 0
-    DEG(6,24,3) = 1
-    DEG(6,24,4) = 0
-    DEG(6,24,5) = 1
-    DEG(6,24,6) = 0
-    DEG(6,24,7) = 1
-    DEG(6,24,8) = 0
-    DEG(6,24,9) = 0
-    DEG(6,24,10) = 0
-    DEG(6,24,11) = 0
-    DEG(6,24,12) = 0
-  COEF(6,24) = (0.9015167301015783, 0)
-    DEG(6,25,1) = 0
-    DEG(6,25,2) = 0
-    DEG(6,25,3) = 0
-    DEG(6,25,4) = 1
-    DEG(6,25,5) = 1
-    DEG(6,25,6) = 0
-    DEG(6,25,7) = 1
-    DEG(6,25,8) = 0
-    DEG(6,25,9) = 0
-    DEG(6,25,10) = 0
-    DEG(6,25,11) = 0
-    DEG(6,25,12) = 0
-  COEF(6,25) = (-1.8087339514516672, 0)
-    DEG(6,26,1) = 0
-    DEG(6,26,2) = 0
-    DEG(6,26,3) = 0
-    DEG(6,26,4) = 0
-    DEG(6,26,5) = 2
-    DEG(6,26,6) = 0
-    DEG(6,26,7) = 1
-    DEG(6,26,8) = 0
-    DEG(6,26,9) = 0
-    DEG(6,26,10) = 0
-    DEG(6,26,11) = 0
-    DEG(6,26,12) = 0
-  COEF(6,26) = (0.013940758951402808, 0)
-    DEG(6,27,1) = 1
-    DEG(6,27,2) = 0
-    DEG(6,27,3) = 0
-    DEG(6,27,4) = 0
-    DEG(6,27,5) = 0
-    DEG(6,27,6) = 1
-    DEG(6,27,7) = 1
-    DEG(6,27,8) = 0
-    DEG(6,27,9) = 0
-    DEG(6,27,10) = 0
-    DEG(6,27,11) = 0
-    DEG(6,27,12) = 0
-  COEF(6,27) = (0.4890823446028041, 0)
-    DEG(6,28,1) = 0
-    DEG(6,28,2) = 1
-    DEG(6,28,3) = 0
-    DEG(6,28,4) = 0
-    DEG(6,28,5) = 0
-    DEG(6,28,6) = 1
-    DEG(6,28,7) = 1
-    DEG(6,28,8) = 0
-    DEG(6,28,9) = 0
-    DEG(6,28,10) = 0
-    DEG(6,28,11) = 0
-    DEG(6,28,12) = 0
-  COEF(6,28) = (0.9015167301015783, 0)
-    DEG(6,29,1) = 0
-    DEG(6,29,2) = 0
-    DEG(6,29,3) = 1
-    DEG(6,29,4) = 0
-    DEG(6,29,5) = 0
-    DEG(6,29,6) = 1
-    DEG(6,29,7) = 1
-    DEG(6,29,8) = 0
-    DEG(6,29,9) = 0
-    DEG(6,29,10) = 0
-    DEG(6,29,11) = 0
-    DEG(6,29,12) = 0
-  COEF(6,29) = (-1.0782769275154223, 0)
-    DEG(6,30,1) = 0
-    DEG(6,30,2) = 0
-    DEG(6,30,3) = 0
-    DEG(6,30,4) = 1
-    DEG(6,30,5) = 0
-    DEG(6,30,6) = 1
-    DEG(6,30,7) = 1
-    DEG(6,30,8) = 0
-    DEG(6,30,9) = 0
-    DEG(6,30,10) = 0
-    DEG(6,30,11) = 0
-    DEG(6,30,12) = 0
-  COEF(6,30) = (-0.4890823446028041, 0)
-    DEG(6,31,1) = 0
-    DEG(6,31,2) = 0
-    DEG(6,31,3) = 0
-    DEG(6,31,4) = 0
-    DEG(6,31,5) = 1
-    DEG(6,31,6) = 1
-    DEG(6,31,7) = 1
-    DEG(6,31,8) = 0
-    DEG(6,31,9) = 0
-    DEG(6,31,10) = 0
-    DEG(6,31,11) = 0
-    DEG(6,31,12) = 0
-  COEF(6,31) = (-0.9015167301015783, 0)
-    DEG(6,32,1) = 0
-    DEG(6,32,2) = 0
-    DEG(6,32,3) = 0
-    DEG(6,32,4) = 0
-    DEG(6,32,5) = 0
-    DEG(6,32,6) = 2
-    DEG(6,32,7) = 1
-    DEG(6,32,8) = 0
-    DEG(6,32,9) = 0
-    DEG(6,32,10) = 0
-    DEG(6,32,11) = 0
-    DEG(6,32,12) = 0
-  COEF(6,32) = (0.5391384637577111, 0)
-    DEG(6,33,1) = 1
-    DEG(6,33,2) = 0
-    DEG(6,33,3) = 0
-    DEG(6,33,4) = 1
-    DEG(6,33,5) = 0
-    DEG(6,33,6) = 0
-    DEG(6,33,7) = 2
-    DEG(6,33,8) = 0
-    DEG(6,33,9) = 0
-    DEG(6,33,10) = 0
-    DEG(6,33,11) = 0
-    DEG(6,33,12) = 0
-  COEF(6,33) = (0.6190940135945602, 0)
-    DEG(6,34,1) = 0
-    DEG(6,34,2) = 1
-    DEG(6,34,3) = 0
-    DEG(6,34,4) = 1
-    DEG(6,34,5) = 0
-    DEG(6,34,6) = 0
-    DEG(6,34,7) = 2
-    DEG(6,34,8) = 0
-    DEG(6,34,9) = 0
-    DEG(6,34,10) = 0
-    DEG(6,34,11) = 0
-    DEG(6,34,12) = 0
-  COEF(6,34) = (-0.04859032400206711, 0)
-    DEG(6,35,1) = 0
-    DEG(6,35,2) = 0
-    DEG(6,35,3) = 1
-    DEG(6,35,4) = 1
-    DEG(6,35,5) = 0
-    DEG(6,35,6) = 0
-    DEG(6,35,7) = 2
-    DEG(6,35,8) = 0
-    DEG(6,35,9) = 0
-    DEG(6,35,10) = 0
-    DEG(6,35,11) = 0
-    DEG(6,35,12) = 0
-  COEF(6,35) = (0.535175971147032, 0)
-    DEG(6,36,1) = 0
-    DEG(6,36,2) = 0
-    DEG(6,36,3) = 0
-    DEG(6,36,4) = 2
-    DEG(6,36,5) = 0
-    DEG(6,36,6) = 0
-    DEG(6,36,7) = 2
-    DEG(6,36,8) = 0
-    DEG(6,36,9) = 0
-    DEG(6,36,10) = 0
-    DEG(6,36,11) = 0
-    DEG(6,36,12) = 0
-  COEF(6,36) = (-0.3095470067972801, 0)
-    DEG(6,37,1) = 1
-    DEG(6,37,2) = 0
-    DEG(6,37,3) = 0
-    DEG(6,37,4) = 0
-    DEG(6,37,5) = 1
-    DEG(6,37,6) = 0
-    DEG(6,37,7) = 2
-    DEG(6,37,8) = 0
-    DEG(6,37,9) = 0
-    DEG(6,37,10) = 0
-    DEG(6,37,11) = 0
-    DEG(6,37,12) = 0
-  COEF(6,37) = (-0.04859032400206711, 0)
-    DEG(6,38,1) = 0
-    DEG(6,38,2) = 1
-    DEG(6,38,3) = 0
-    DEG(6,38,4) = 0
-    DEG(6,38,5) = 1
-    DEG(6,38,6) = 0
-    DEG(6,38,7) = 2
-    DEG(6,38,8) = 0
-    DEG(6,38,9) = 0
-    DEG(6,38,10) = 0
-    DEG(6,38,11) = 0
-    DEG(6,38,12) = 0
-  COEF(6,38) = (-0.3938370964695736, 0)
-    DEG(6,39,1) = 0
-    DEG(6,39,2) = 0
-    DEG(6,39,3) = 1
-    DEG(6,39,4) = 0
-    DEG(6,39,5) = 1
-    DEG(6,39,6) = 0
-    DEG(6,39,7) = 2
-    DEG(6,39,8) = 0
-    DEG(6,39,9) = 0
-    DEG(6,39,10) = 0
-    DEG(6,39,11) = 0
-    DEG(6,39,12) = 0
-  COEF(6,39) = (0.4810065524214148, 0)
-    DEG(6,40,1) = 0
-    DEG(6,40,2) = 0
-    DEG(6,40,3) = 0
-    DEG(6,40,4) = 1
-    DEG(6,40,5) = 1
-    DEG(6,40,6) = 0
-    DEG(6,40,7) = 2
-    DEG(6,40,8) = 0
-    DEG(6,40,9) = 0
-    DEG(6,40,10) = 0
-    DEG(6,40,11) = 0
-    DEG(6,40,12) = 0
-  COEF(6,40) = (0.04859032400206711, 0)
-    DEG(6,41,1) = 0
-    DEG(6,41,2) = 0
-    DEG(6,41,3) = 0
-    DEG(6,41,4) = 0
-    DEG(6,41,5) = 2
-    DEG(6,41,6) = 0
-    DEG(6,41,7) = 2
-    DEG(6,41,8) = 0
-    DEG(6,41,9) = 0
-    DEG(6,41,10) = 0
-    DEG(6,41,11) = 0
-    DEG(6,41,12) = 0
-  COEF(6,41) = (0.1969185482347868, 0)
-    DEG(6,42,1) = 1
-    DEG(6,42,2) = 0
-    DEG(6,42,3) = 0
-    DEG(6,42,4) = 0
-    DEG(6,42,5) = 0
-    DEG(6,42,6) = 1
-    DEG(6,42,7) = 2
-    DEG(6,42,8) = 0
-    DEG(6,42,9) = 0
-    DEG(6,42,10) = 0
-    DEG(6,42,11) = 0
-    DEG(6,42,12) = 0
-  COEF(6,42) = (0.535175971147032, 0)
-    DEG(6,43,1) = 0
-    DEG(6,43,2) = 1
-    DEG(6,43,3) = 0
-    DEG(6,43,4) = 0
-    DEG(6,43,5) = 0
-    DEG(6,43,6) = 1
-    DEG(6,43,7) = 2
-    DEG(6,43,8) = 0
-    DEG(6,43,9) = 0
-    DEG(6,43,10) = 0
-    DEG(6,43,11) = 0
-    DEG(6,43,12) = 0
-  COEF(6,43) = (0.4810065524214148, 0)
-    DEG(6,44,1) = 0
-    DEG(6,44,2) = 0
-    DEG(6,44,3) = 1
-    DEG(6,44,4) = 0
-    DEG(6,44,5) = 0
-    DEG(6,44,6) = 1
-    DEG(6,44,7) = 2
-    DEG(6,44,8) = 0
-    DEG(6,44,9) = 0
-    DEG(6,44,10) = 0
-    DEG(6,44,11) = 0
-    DEG(6,44,12) = 0
-  COEF(6,44) = (-0.22525691712498658, 0)
-    DEG(6,45,1) = 0
-    DEG(6,45,2) = 0
-    DEG(6,45,3) = 0
-    DEG(6,45,4) = 1
-    DEG(6,45,5) = 0
-    DEG(6,45,6) = 1
-    DEG(6,45,7) = 2
-    DEG(6,45,8) = 0
-    DEG(6,45,9) = 0
-    DEG(6,45,10) = 0
-    DEG(6,45,11) = 0
-    DEG(6,45,12) = 0
-  COEF(6,45) = (-0.535175971147032, 0)
-    DEG(6,46,1) = 0
-    DEG(6,46,2) = 0
-    DEG(6,46,3) = 0
-    DEG(6,46,4) = 0
-    DEG(6,46,5) = 1
-    DEG(6,46,6) = 1
-    DEG(6,46,7) = 2
-    DEG(6,46,8) = 0
-    DEG(6,46,9) = 0
-    DEG(6,46,10) = 0
-    DEG(6,46,11) = 0
-    DEG(6,46,12) = 0
-  COEF(6,46) = (-0.4810065524214148, 0)
-    DEG(6,47,1) = 0
-    DEG(6,47,2) = 0
-    DEG(6,47,3) = 0
-    DEG(6,47,4) = 0
-    DEG(6,47,5) = 0
-    DEG(6,47,6) = 2
-    DEG(6,47,7) = 2
-    DEG(6,47,8) = 0
-    DEG(6,47,9) = 0
-    DEG(6,47,10) = 0
-    DEG(6,47,11) = 0
-    DEG(6,47,12) = 0
-  COEF(6,47) = (0.11262845856249329, 0)
-    DEG(6,48,1) = 0
-    DEG(6,48,2) = 0
-    DEG(6,48,3) = 0
-    DEG(6,48,4) = 0
-    DEG(6,48,5) = 0
-    DEG(6,48,6) = 0
-    DEG(6,48,7) = 0
-    DEG(6,48,8) = 1
-    DEG(6,48,9) = 0
-    DEG(6,48,10) = 0
-    DEG(6,48,11) = 0
-    DEG(6,48,12) = 0
-  COEF(6,48) = (0.648776883686337, 0)
-    DEG(6,49,1) = 1
-    DEG(6,49,2) = 0
-    DEG(6,49,3) = 0
-    DEG(6,49,4) = 1
-    DEG(6,49,5) = 0
-    DEG(6,49,6) = 0
-    DEG(6,49,7) = 0
-    DEG(6,49,8) = 1
-    DEG(6,49,9) = 0
-    DEG(6,49,10) = 0
-    DEG(6,49,11) = 0
-    DEG(6,49,12) = 0
-  COEF(6,49) = (-1.2292807103261179, 0)
-    DEG(6,50,1) = 0
-    DEG(6,50,2) = 1
-    DEG(6,50,3) = 0
-    DEG(6,50,4) = 1
-    DEG(6,50,5) = 0
-    DEG(6,50,6) = 0
-    DEG(6,50,7) = 0
-    DEG(6,50,8) = 1
-    DEG(6,50,9) = 0
-    DEG(6,50,10) = 0
-    DEG(6,50,11) = 0
-    DEG(6,50,12) = 0
-  COEF(6,50) = (0.22806643039184485, 0)
-    DEG(6,51,1) = 0
-    DEG(6,51,2) = 0
-    DEG(6,51,3) = 1
-    DEG(6,51,4) = 1
-    DEG(6,51,5) = 0
-    DEG(6,51,6) = 0
-    DEG(6,51,7) = 0
-    DEG(6,51,8) = 1
-    DEG(6,51,9) = 0
-    DEG(6,51,10) = 0
-    DEG(6,51,11) = 0
-    DEG(6,51,12) = 0
-  COEF(6,51) = (0.80395821283862, 0)
-    DEG(6,52,1) = 0
-    DEG(6,52,2) = 0
-    DEG(6,52,3) = 0
-    DEG(6,52,4) = 2
-    DEG(6,52,5) = 0
-    DEG(6,52,6) = 0
-    DEG(6,52,7) = 0
-    DEG(6,52,8) = 1
-    DEG(6,52,9) = 0
-    DEG(6,52,10) = 0
-    DEG(6,52,11) = 0
-    DEG(6,52,12) = 0
-  COEF(6,52) = (0.6146403551630589, 0)
-    DEG(6,53,1) = 1
-    DEG(6,53,2) = 0
-    DEG(6,53,3) = 0
-    DEG(6,53,4) = 0
-    DEG(6,53,5) = 1
-    DEG(6,53,6) = 0
-    DEG(6,53,7) = 0
-    DEG(6,53,8) = 1
-    DEG(6,53,9) = 0
-    DEG(6,53,10) = 0
-    DEG(6,53,11) = 0
-    DEG(6,53,12) = 0
-  COEF(6,53) = (0.22806643039184485, 0)
-    DEG(6,54,1) = 0
-    DEG(6,54,2) = 1
-    DEG(6,54,3) = 0
-    DEG(6,54,4) = 0
-    DEG(6,54,5) = 1
-    DEG(6,54,6) = 0
-    DEG(6,54,7) = 0
-    DEG(6,54,8) = 1
-    DEG(6,54,9) = 0
-    DEG(6,54,10) = 0
-    DEG(6,54,11) = 0
-    DEG(6,54,12) = 0
-  COEF(6,54) = (0.11645743562199212, 0)
-    DEG(6,55,1) = 0
-    DEG(6,55,2) = 0
-    DEG(6,55,3) = 1
-    DEG(6,55,4) = 0
-    DEG(6,55,5) = 1
-    DEG(6,55,6) = 0
-    DEG(6,55,7) = 0
-    DEG(6,55,8) = 1
-    DEG(6,55,9) = 0
-    DEG(6,55,10) = 0
-    DEG(6,55,11) = 0
-    DEG(6,55,12) = 0
-  COEF(6,55) = (1.1662773028933966, 0)
-    DEG(6,56,1) = 0
-    DEG(6,56,2) = 0
-    DEG(6,56,3) = 0
-    DEG(6,56,4) = 1
-    DEG(6,56,5) = 1
-    DEG(6,56,6) = 0
-    DEG(6,56,7) = 0
-    DEG(6,56,8) = 1
-    DEG(6,56,9) = 0
-    DEG(6,56,10) = 0
-    DEG(6,56,11) = 0
-    DEG(6,56,12) = 0
-  COEF(6,56) = (-0.22806643039184485, 0)
-    DEG(6,57,1) = 0
-    DEG(6,57,2) = 0
-    DEG(6,57,3) = 0
-    DEG(6,57,4) = 0
-    DEG(6,57,5) = 2
-    DEG(6,57,6) = 0
-    DEG(6,57,7) = 0
-    DEG(6,57,8) = 1
-    DEG(6,57,9) = 0
-    DEG(6,57,10) = 0
-    DEG(6,57,11) = 0
-    DEG(6,57,12) = 0
-  COEF(6,57) = (-0.05822871781099606, 0)
-    DEG(6,58,1) = 1
-    DEG(6,58,2) = 0
-    DEG(6,58,3) = 0
-    DEG(6,58,4) = 0
-    DEG(6,58,5) = 0
-    DEG(6,58,6) = 1
-    DEG(6,58,7) = 0
-    DEG(6,58,8) = 1
-    DEG(6,58,9) = 0
-    DEG(6,58,10) = 0
-    DEG(6,58,11) = 0
-    DEG(6,58,12) = 0
-  COEF(6,58) = (0.80395821283862, 0)
-    DEG(6,59,1) = 0
-    DEG(6,59,2) = 1
-    DEG(6,59,3) = 0
-    DEG(6,59,4) = 0
-    DEG(6,59,5) = 0
-    DEG(6,59,6) = 1
-    DEG(6,59,7) = 0
-    DEG(6,59,8) = 1
-    DEG(6,59,9) = 0
-    DEG(6,59,10) = 0
-    DEG(6,59,11) = 0
-    DEG(6,59,12) = 0
-  COEF(6,59) = (1.1662773028933966, 0)
-    DEG(6,60,1) = 0
-    DEG(6,60,2) = 0
-    DEG(6,60,3) = 1
-    DEG(6,60,4) = 0
-    DEG(6,60,5) = 0
-    DEG(6,60,6) = 1
-    DEG(6,60,7) = 0
-    DEG(6,60,8) = 1
-    DEG(6,60,9) = 0
-    DEG(6,60,10) = 0
-    DEG(6,60,11) = 0
-    DEG(6,60,12) = 0
-  COEF(6,60) = (-0.1847304926685484, 0)
-    DEG(6,61,1) = 0
-    DEG(6,61,2) = 0
-    DEG(6,61,3) = 0
-    DEG(6,61,4) = 1
-    DEG(6,61,5) = 0
-    DEG(6,61,6) = 1
-    DEG(6,61,7) = 0
-    DEG(6,61,8) = 1
-    DEG(6,61,9) = 0
-    DEG(6,61,10) = 0
-    DEG(6,61,11) = 0
-    DEG(6,61,12) = 0
-  COEF(6,61) = (-0.80395821283862, 0)
-    DEG(6,62,1) = 0
-    DEG(6,62,2) = 0
-    DEG(6,62,3) = 0
-    DEG(6,62,4) = 0
-    DEG(6,62,5) = 1
-    DEG(6,62,6) = 1
-    DEG(6,62,7) = 0
-    DEG(6,62,8) = 1
-    DEG(6,62,9) = 0
-    DEG(6,62,10) = 0
-    DEG(6,62,11) = 0
-    DEG(6,62,12) = 0
-  COEF(6,62) = (-1.1662773028933966, 0)
-    DEG(6,63,1) = 0
-    DEG(6,63,2) = 0
-    DEG(6,63,3) = 0
-    DEG(6,63,4) = 0
-    DEG(6,63,5) = 0
-    DEG(6,63,6) = 2
-    DEG(6,63,7) = 0
-    DEG(6,63,8) = 1
-    DEG(6,63,9) = 0
-    DEG(6,63,10) = 0
-    DEG(6,63,11) = 0
-    DEG(6,63,12) = 0
-  COEF(6,63) = (0.0923652463342742, 0)
-    DEG(6,64,1) = 1
-    DEG(6,64,2) = 0
-    DEG(6,64,3) = 0
-    DEG(6,64,4) = 1
-    DEG(6,64,5) = 0
-    DEG(6,64,6) = 0
-    DEG(6,64,7) = 1
-    DEG(6,64,8) = 1
-    DEG(6,64,9) = 0
-    DEG(6,64,10) = 0
-    DEG(6,64,11) = 0
-    DEG(6,64,12) = 0
-  COEF(6,64) = (2.4069644611129, 0)
-    DEG(6,65,1) = 0
-    DEG(6,65,2) = 1
-    DEG(6,65,3) = 0
-    DEG(6,65,4) = 1
-    DEG(6,65,5) = 0
-    DEG(6,65,6) = 0
-    DEG(6,65,7) = 1
-    DEG(6,65,8) = 1
-    DEG(6,65,9) = 0
-    DEG(6,65,10) = 0
-    DEG(6,65,11) = 0
-    DEG(6,65,12) = 0
-  COEF(6,65) = (-0.646016231256265, 0)
-    DEG(6,66,1) = 0
-    DEG(6,66,2) = 0
-    DEG(6,66,3) = 1
-    DEG(6,66,4) = 1
-    DEG(6,66,5) = 0
-    DEG(6,66,6) = 0
-    DEG(6,66,7) = 1
-    DEG(6,66,8) = 1
-    DEG(6,66,9) = 0
-    DEG(6,66,10) = 0
-    DEG(6,66,11) = 0
-    DEG(6,66,12) = 0
-  COEF(6,66) = (1.0660138295728432, 0)
-    DEG(6,67,1) = 0
-    DEG(6,67,2) = 0
-    DEG(6,67,3) = 0
-    DEG(6,67,4) = 2
-    DEG(6,67,5) = 0
-    DEG(6,67,6) = 0
-    DEG(6,67,7) = 1
-    DEG(6,67,8) = 1
-    DEG(6,67,9) = 0
-    DEG(6,67,10) = 0
-    DEG(6,67,11) = 0
-    DEG(6,67,12) = 0
-  COEF(6,67) = (-1.20348223055645, 0)
-    DEG(6,68,1) = 1
-    DEG(6,68,2) = 0
-    DEG(6,68,3) = 0
-    DEG(6,68,4) = 0
-    DEG(6,68,5) = 1
-    DEG(6,68,6) = 0
-    DEG(6,68,7) = 1
-    DEG(6,68,8) = 1
-    DEG(6,68,9) = 0
-    DEG(6,68,10) = 0
-    DEG(6,68,11) = 0
-    DEG(6,68,12) = 0
-  COEF(6,68) = (-0.646016231256265, 0)
-    DEG(6,69,1) = 0
-    DEG(6,69,2) = 1
-    DEG(6,69,3) = 0
-    DEG(6,69,4) = 0
-    DEG(6,69,5) = 1
-    DEG(6,69,6) = 0
-    DEG(6,69,7) = 1
-    DEG(6,69,8) = 1
-    DEG(6,69,9) = 0
-    DEG(6,69,10) = 0
-    DEG(6,69,11) = 0
-    DEG(6,69,12) = 0
-  COEF(6,69) = (-2.6504605278900617, 0)
-    DEG(6,70,1) = 0
-    DEG(6,70,2) = 0
-    DEG(6,70,3) = 1
-    DEG(6,70,4) = 0
-    DEG(6,70,5) = 1
-    DEG(6,70,6) = 0
-    DEG(6,70,7) = 1
-    DEG(6,70,8) = 1
-    DEG(6,70,9) = 0
-    DEG(6,70,10) = 0
-    DEG(6,70,11) = 0
-    DEG(6,70,12) = 0
-  COEF(6,70) = (1.2454379259914303, 0)
-    DEG(6,71,1) = 0
-    DEG(6,71,2) = 0
-    DEG(6,71,3) = 0
-    DEG(6,71,4) = 1
-    DEG(6,71,5) = 1
-    DEG(6,71,6) = 0
-    DEG(6,71,7) = 1
-    DEG(6,71,8) = 1
-    DEG(6,71,9) = 0
-    DEG(6,71,10) = 0
-    DEG(6,71,11) = 0
-    DEG(6,71,12) = 0
-  COEF(6,71) = (0.646016231256265, 0)
-    DEG(6,72,1) = 0
-    DEG(6,72,2) = 0
-    DEG(6,72,3) = 0
-    DEG(6,72,4) = 0
-    DEG(6,72,5) = 2
-    DEG(6,72,6) = 0
-    DEG(6,72,7) = 1
-    DEG(6,72,8) = 1
-    DEG(6,72,9) = 0
-    DEG(6,72,10) = 0
-    DEG(6,72,11) = 0
-    DEG(6,72,12) = 0
-  COEF(6,72) = (1.3252302639450309, 0)
-    DEG(6,73,1) = 1
-    DEG(6,73,2) = 0
-    DEG(6,73,3) = 0
-    DEG(6,73,4) = 0
-    DEG(6,73,5) = 0
-    DEG(6,73,6) = 1
-    DEG(6,73,7) = 1
-    DEG(6,73,8) = 1
-    DEG(6,73,9) = 0
-    DEG(6,73,10) = 0
-    DEG(6,73,11) = 0
-    DEG(6,73,12) = 0
-  COEF(6,73) = (1.0660138295728432, 0)
-    DEG(6,74,1) = 0
-    DEG(6,74,2) = 1
-    DEG(6,74,3) = 0
-    DEG(6,74,4) = 0
-    DEG(6,74,5) = 0
-    DEG(6,74,6) = 1
-    DEG(6,74,7) = 1
-    DEG(6,74,8) = 1
-    DEG(6,74,9) = 0
-    DEG(6,74,10) = 0
-    DEG(6,74,11) = 0
-    DEG(6,74,12) = 0
-  COEF(6,74) = (1.2454379259914303, 0)
-    DEG(6,75,1) = 0
-    DEG(6,75,2) = 0
-    DEG(6,75,3) = 1
-    DEG(6,75,4) = 0
-    DEG(6,75,5) = 0
-    DEG(6,75,6) = 1
-    DEG(6,75,7) = 1
-    DEG(6,75,8) = 1
-    DEG(6,75,9) = 0
-    DEG(6,75,10) = 0
-    DEG(6,75,11) = 0
-    DEG(6,75,12) = 0
-  COEF(6,75) = (0.24349606677716149, 0)
-    DEG(6,76,1) = 0
-    DEG(6,76,2) = 0
-    DEG(6,76,3) = 0
-    DEG(6,76,4) = 1
-    DEG(6,76,5) = 0
-    DEG(6,76,6) = 1
-    DEG(6,76,7) = 1
-    DEG(6,76,8) = 1
-    DEG(6,76,9) = 0
-    DEG(6,76,10) = 0
-    DEG(6,76,11) = 0
-    DEG(6,76,12) = 0
-  COEF(6,76) = (-1.0660138295728432, 0)
-    DEG(6,77,1) = 0
-    DEG(6,77,2) = 0
-    DEG(6,77,3) = 0
-    DEG(6,77,4) = 0
-    DEG(6,77,5) = 1
-    DEG(6,77,6) = 1
-    DEG(6,77,7) = 1
-    DEG(6,77,8) = 1
-    DEG(6,77,9) = 0
-    DEG(6,77,10) = 0
-    DEG(6,77,11) = 0
-    DEG(6,77,12) = 0
-  COEF(6,77) = (-1.2454379259914303, 0)
-    DEG(6,78,1) = 0
-    DEG(6,78,2) = 0
-    DEG(6,78,3) = 0
-    DEG(6,78,4) = 0
-    DEG(6,78,5) = 0
-    DEG(6,78,6) = 2
-    DEG(6,78,7) = 1
-    DEG(6,78,8) = 1
-    DEG(6,78,9) = 0
-    DEG(6,78,10) = 0
-    DEG(6,78,11) = 0
-    DEG(6,78,12) = 0
-  COEF(6,78) = (-0.12174803338858074, 0)
-    DEG(6,79,1) = 1
-    DEG(6,79,2) = 0
-    DEG(6,79,3) = 0
-    DEG(6,79,4) = 1
-    DEG(6,79,5) = 0
-    DEG(6,79,6) = 0
-    DEG(6,79,7) = 0
-    DEG(6,79,8) = 2
-    DEG(6,79,9) = 0
-    DEG(6,79,10) = 0
-    DEG(6,79,11) = 0
-    DEG(6,79,12) = 0
-  COEF(6,79) = (-0.8516563447287065, 0)
-    DEG(6,80,1) = 0
-    DEG(6,80,2) = 1
-    DEG(6,80,3) = 0
-    DEG(6,80,4) = 1
-    DEG(6,80,5) = 0
-    DEG(6,80,6) = 0
-    DEG(6,80,7) = 0
-    DEG(6,80,8) = 2
-    DEG(6,80,9) = 0
-    DEG(6,80,10) = 0
-    DEG(6,80,11) = 0
-    DEG(6,80,12) = 0
-  COEF(6,80) = (0.8652520007128818, 0)
-    DEG(6,81,1) = 0
-    DEG(6,81,2) = 0
-    DEG(6,81,3) = 1
-    DEG(6,81,4) = 1
-    DEG(6,81,5) = 0
-    DEG(6,81,6) = 0
-    DEG(6,81,7) = 0
-    DEG(6,81,8) = 2
-    DEG(6,81,9) = 0
-    DEG(6,81,10) = 0
-    DEG(6,81,11) = 0
-    DEG(6,81,12) = 0
-  COEF(6,81) = (0.38589665784753285, 0)
-    DEG(6,82,1) = 0
-    DEG(6,82,2) = 0
-    DEG(6,82,3) = 0
-    DEG(6,82,4) = 2
-    DEG(6,82,5) = 0
-    DEG(6,82,6) = 0
-    DEG(6,82,7) = 0
-    DEG(6,82,8) = 2
-    DEG(6,82,9) = 0
-    DEG(6,82,10) = 0
-    DEG(6,82,11) = 0
-    DEG(6,82,12) = 0
-  COEF(6,82) = (0.4258281723643533, 0)
-    DEG(6,83,1) = 1
-    DEG(6,83,2) = 0
-    DEG(6,83,3) = 0
-    DEG(6,83,4) = 0
-    DEG(6,83,5) = 1
-    DEG(6,83,6) = 0
-    DEG(6,83,7) = 0
-    DEG(6,83,8) = 2
-    DEG(6,83,9) = 0
-    DEG(6,83,10) = 0
-    DEG(6,83,11) = 0
-    DEG(6,83,12) = 0
-  COEF(6,83) = (0.8652520007128818, 0)
-    DEG(6,84,1) = 0
-    DEG(6,84,2) = 1
-    DEG(6,84,3) = 0
-    DEG(6,84,4) = 0
-    DEG(6,84,5) = 1
-    DEG(6,84,6) = 0
-    DEG(6,84,7) = 0
-    DEG(6,84,8) = 2
-    DEG(6,84,9) = 0
-    DEG(6,84,10) = 0
-    DEG(6,84,11) = 0
-    DEG(6,84,12) = 0
-  COEF(6,84) = (-0.7896831047932922, 0)
-    DEG(6,85,1) = 0
-    DEG(6,85,2) = 0
-    DEG(6,85,3) = 1
-    DEG(6,85,4) = 0
-    DEG(6,85,5) = 1
-    DEG(6,85,6) = 0
-    DEG(6,85,7) = 0
-    DEG(6,85,8) = 2
-    DEG(6,85,9) = 0
-    DEG(6,85,10) = 0
-    DEG(6,85,11) = 0
-    DEG(6,85,12) = 0
-  COEF(6,85) = (-0.7949643782167322, 0)
-    DEG(6,86,1) = 0
-    DEG(6,86,2) = 0
-    DEG(6,86,3) = 0
-    DEG(6,86,4) = 1
-    DEG(6,86,5) = 1
-    DEG(6,86,6) = 0
-    DEG(6,86,7) = 0
-    DEG(6,86,8) = 2
-    DEG(6,86,9) = 0
-    DEG(6,86,10) = 0
-    DEG(6,86,11) = 0
-    DEG(6,86,12) = 0
-  COEF(6,86) = (-0.8652520007128818, 0)
-    DEG(6,87,1) = 0
-    DEG(6,87,2) = 0
-    DEG(6,87,3) = 0
-    DEG(6,87,4) = 0
-    DEG(6,87,5) = 2
-    DEG(6,87,6) = 0
-    DEG(6,87,7) = 0
-    DEG(6,87,8) = 2
-    DEG(6,87,9) = 0
-    DEG(6,87,10) = 0
-    DEG(6,87,11) = 0
-    DEG(6,87,12) = 0
-  COEF(6,87) = (0.3948415523966461, 0)
-    DEG(6,88,1) = 1
-    DEG(6,88,2) = 0
-    DEG(6,88,3) = 0
-    DEG(6,88,4) = 0
-    DEG(6,88,5) = 0
-    DEG(6,88,6) = 1
-    DEG(6,88,7) = 0
-    DEG(6,88,8) = 2
-    DEG(6,88,9) = 0
-    DEG(6,88,10) = 0
-    DEG(6,88,11) = 0
-    DEG(6,88,12) = 0
-  COEF(6,88) = (0.38589665784753285, 0)
-    DEG(6,89,1) = 0
-    DEG(6,89,2) = 1
-    DEG(6,89,3) = 0
-    DEG(6,89,4) = 0
-    DEG(6,89,5) = 0
-    DEG(6,89,6) = 1
-    DEG(6,89,7) = 0
-    DEG(6,89,8) = 2
-    DEG(6,89,9) = 0
-    DEG(6,89,10) = 0
-    DEG(6,89,11) = 0
-    DEG(6,89,12) = 0
-  COEF(6,89) = (-0.7949643782167322, 0)
-    DEG(6,90,1) = 0
-    DEG(6,90,2) = 0
-    DEG(6,90,3) = 1
-    DEG(6,90,4) = 0
-    DEG(6,90,5) = 0
-    DEG(6,90,6) = 1
-    DEG(6,90,7) = 0
-    DEG(6,90,8) = 2
-    DEG(6,90,9) = 0
-    DEG(6,90,10) = 0
-    DEG(6,90,11) = 0
-    DEG(6,90,12) = 0
-  COEF(6,90) = (1.6413394495219988, 0)
-    DEG(6,91,1) = 0
-    DEG(6,91,2) = 0
-    DEG(6,91,3) = 0
-    DEG(6,91,4) = 1
-    DEG(6,91,5) = 0
-    DEG(6,91,6) = 1
-    DEG(6,91,7) = 0
-    DEG(6,91,8) = 2
-    DEG(6,91,9) = 0
-    DEG(6,91,10) = 0
-    DEG(6,91,11) = 0
-    DEG(6,91,12) = 0
-  COEF(6,91) = (-0.38589665784753285, 0)
-    DEG(6,92,1) = 0
-    DEG(6,92,2) = 0
-    DEG(6,92,3) = 0
-    DEG(6,92,4) = 0
-    DEG(6,92,5) = 1
-    DEG(6,92,6) = 1
-    DEG(6,92,7) = 0
-    DEG(6,92,8) = 2
-    DEG(6,92,9) = 0
-    DEG(6,92,10) = 0
-    DEG(6,92,11) = 0
-    DEG(6,92,12) = 0
-  COEF(6,92) = (0.7949643782167322, 0)
-    DEG(6,93,1) = 0
-    DEG(6,93,2) = 0
-    DEG(6,93,3) = 0
-    DEG(6,93,4) = 0
-    DEG(6,93,5) = 0
-    DEG(6,93,6) = 2
-    DEG(6,93,7) = 0
-    DEG(6,93,8) = 2
-    DEG(6,93,9) = 0
-    DEG(6,93,10) = 0
-    DEG(6,93,11) = 0
-    DEG(6,93,12) = 0
-  COEF(6,93) = (-0.8206697247609994, 0)
-    DEG(6,94,1) = 0
-    DEG(6,94,2) = 0
-    DEG(6,94,3) = 0
-    DEG(6,94,4) = 0
-    DEG(6,94,5) = 0
-    DEG(6,94,6) = 0
-    DEG(6,94,7) = 0
-    DEG(6,94,8) = 0
-    DEG(6,94,9) = 1
-    DEG(6,94,10) = 0
-    DEG(6,94,11) = 0
-    DEG(6,94,12) = 0
-  COEF(6,94) = (-2.927829052320202, 0)
-    DEG(6,95,1) = 1
-    DEG(6,95,2) = 0
-    DEG(6,95,3) = 0
-    DEG(6,95,4) = 1
-    DEG(6,95,5) = 0
-    DEG(6,95,6) = 0
-    DEG(6,95,7) = 0
-    DEG(6,95,8) = 0
-    DEG(6,95,9) = 1
-    DEG(6,95,10) = 0
-    DEG(6,95,11) = 0
-    DEG(6,95,12) = 0
-  COEF(6,95) = (2.5959797215665645, 0)
-    DEG(6,96,1) = 0
-    DEG(6,96,2) = 1
-    DEG(6,96,3) = 0
-    DEG(6,96,4) = 1
-    DEG(6,96,5) = 0
-    DEG(6,96,6) = 0
-    DEG(6,96,7) = 0
-    DEG(6,96,8) = 0
-    DEG(6,96,9) = 1
-    DEG(6,96,10) = 0
-    DEG(6,96,11) = 0
-    DEG(6,96,12) = 0
-  COEF(6,96) = (-1.3380109916107221, 0)
-    DEG(6,97,1) = 0
-    DEG(6,97,2) = 0
-    DEG(6,97,3) = 1
-    DEG(6,97,4) = 1
-    DEG(6,97,5) = 0
-    DEG(6,97,6) = 0
-    DEG(6,97,7) = 0
-    DEG(6,97,8) = 0
-    DEG(6,97,9) = 1
-    DEG(6,97,10) = 0
-    DEG(6,97,11) = 0
-    DEG(6,97,12) = 0
-  COEF(6,97) = (0.8470506159621422, 0)
-    DEG(6,98,1) = 0
-    DEG(6,98,2) = 0
-    DEG(6,98,3) = 0
-    DEG(6,98,4) = 2
-    DEG(6,98,5) = 0
-    DEG(6,98,6) = 0
-    DEG(6,98,7) = 0
-    DEG(6,98,8) = 0
-    DEG(6,98,9) = 1
-    DEG(6,98,10) = 0
-    DEG(6,98,11) = 0
-    DEG(6,98,12) = 0
-  COEF(6,98) = (-1.2979898607832823, 0)
-    DEG(6,99,1) = 1
-    DEG(6,99,2) = 0
-    DEG(6,99,3) = 0
-    DEG(6,99,4) = 0
-    DEG(6,99,5) = 1
-    DEG(6,99,6) = 0
-    DEG(6,99,7) = 0
-    DEG(6,99,8) = 0
-    DEG(6,99,9) = 1
-    DEG(6,99,10) = 0
-    DEG(6,99,11) = 0
-    DEG(6,99,12) = 0
-  COEF(6,99) = (-1.3380109916107221, 0)
-    DEG(6,100,1) = 0
-    DEG(6,100,2) = 1
-    DEG(6,100,3) = 0
-    DEG(6,100,4) = 0
-    DEG(6,100,5) = 1
-    DEG(6,100,6) = 0
-    DEG(6,100,7) = 0
-    DEG(6,100,8) = 0
-    DEG(6,100,9) = 1
-    DEG(6,100,10) = 0
-    DEG(6,100,11) = 0
-    DEG(6,100,12) = 0
-  COEF(6,100) = (0.1403647797439825, 0)
-    DEG(6,101,1) = 0
-    DEG(6,101,2) = 0
-    DEG(6,101,3) = 1
-    DEG(6,101,4) = 0
-    DEG(6,101,5) = 1
-    DEG(6,101,6) = 0
-    DEG(6,101,7) = 0
-    DEG(6,101,8) = 0
-    DEG(6,101,9) = 1
-    DEG(6,101,10) = 0
-    DEG(6,101,11) = 0
-    DEG(6,101,12) = 0
-  COEF(6,101) = (0.5247596024594355, 0)
-    DEG(6,102,1) = 0
-    DEG(6,102,2) = 0
-    DEG(6,102,3) = 0
-    DEG(6,102,4) = 1
-    DEG(6,102,5) = 1
-    DEG(6,102,6) = 0
-    DEG(6,102,7) = 0
-    DEG(6,102,8) = 0
-    DEG(6,102,9) = 1
-    DEG(6,102,10) = 0
-    DEG(6,102,11) = 0
-    DEG(6,102,12) = 0
-  COEF(6,102) = (1.3380109916107221, 0)
-    DEG(6,103,1) = 0
-    DEG(6,103,2) = 0
-    DEG(6,103,3) = 0
-    DEG(6,103,4) = 0
-    DEG(6,103,5) = 2
-    DEG(6,103,6) = 0
-    DEG(6,103,7) = 0
-    DEG(6,103,8) = 0
-    DEG(6,103,9) = 1
-    DEG(6,103,10) = 0
-    DEG(6,103,11) = 0
-    DEG(6,103,12) = 0
-  COEF(6,103) = (-0.07018238987199125, 0)
-    DEG(6,104,1) = 1
-    DEG(6,104,2) = 0
-    DEG(6,104,3) = 0
-    DEG(6,104,4) = 0
-    DEG(6,104,5) = 0
-    DEG(6,104,6) = 1
-    DEG(6,104,7) = 0
-    DEG(6,104,8) = 0
-    DEG(6,104,9) = 1
-    DEG(6,104,10) = 0
-    DEG(6,104,11) = 0
-    DEG(6,104,12) = 0
-  COEF(6,104) = (0.8470506159621422, 0)
-    DEG(6,105,1) = 0
-    DEG(6,105,2) = 1
-    DEG(6,105,3) = 0
-    DEG(6,105,4) = 0
-    DEG(6,105,5) = 0
-    DEG(6,105,6) = 1
-    DEG(6,105,7) = 0
-    DEG(6,105,8) = 0
-    DEG(6,105,9) = 1
-    DEG(6,105,10) = 0
-    DEG(6,105,11) = 0
-    DEG(6,105,12) = 0
-  COEF(6,105) = (0.5247596024594355, 0)
-    DEG(6,106,1) = 0
-    DEG(6,106,2) = 0
-    DEG(6,106,3) = 1
-    DEG(6,106,4) = 0
-    DEG(6,106,5) = 0
-    DEG(6,106,6) = 1
-    DEG(6,106,7) = 0
-    DEG(6,106,8) = 0
-    DEG(6,106,9) = 1
-    DEG(6,106,10) = 0
-    DEG(6,106,11) = 0
-    DEG(6,106,12) = 0
-  COEF(6,106) = (3.1193136033298567, 0)
-    DEG(6,107,1) = 0
-    DEG(6,107,2) = 0
-    DEG(6,107,3) = 0
-    DEG(6,107,4) = 1
-    DEG(6,107,5) = 0
-    DEG(6,107,6) = 1
-    DEG(6,107,7) = 0
-    DEG(6,107,8) = 0
-    DEG(6,107,9) = 1
-    DEG(6,107,10) = 0
-    DEG(6,107,11) = 0
-    DEG(6,107,12) = 0
-  COEF(6,107) = (-0.8470506159621422, 0)
-    DEG(6,108,1) = 0
-    DEG(6,108,2) = 0
-    DEG(6,108,3) = 0
-    DEG(6,108,4) = 0
-    DEG(6,108,5) = 1
-    DEG(6,108,6) = 1
-    DEG(6,108,7) = 0
-    DEG(6,108,8) = 0
-    DEG(6,108,9) = 1
-    DEG(6,108,10) = 0
-    DEG(6,108,11) = 0
-    DEG(6,108,12) = 0
-  COEF(6,108) = (-0.5247596024594355, 0)
-    DEG(6,109,1) = 0
-    DEG(6,109,2) = 0
-    DEG(6,109,3) = 0
-    DEG(6,109,4) = 0
-    DEG(6,109,5) = 0
-    DEG(6,109,6) = 2
-    DEG(6,109,7) = 0
-    DEG(6,109,8) = 0
-    DEG(6,109,9) = 1
-    DEG(6,109,10) = 0
-    DEG(6,109,11) = 0
-    DEG(6,109,12) = 0
-  COEF(6,109) = (-1.5596568016649284, 0)
-    DEG(6,110,1) = 1
-    DEG(6,110,2) = 0
-    DEG(6,110,3) = 0
-    DEG(6,110,4) = 1
-    DEG(6,110,5) = 0
-    DEG(6,110,6) = 0
-    DEG(6,110,7) = 1
-    DEG(6,110,8) = 0
-    DEG(6,110,9) = 1
-    DEG(6,110,10) = 0
-    DEG(6,110,11) = 0
-    DEG(6,110,12) = 0
-  COEF(6,110) = (0.7836412207414534, 0)
-    DEG(6,111,1) = 0
-    DEG(6,111,2) = 1
-    DEG(6,111,3) = 0
-    DEG(6,111,4) = 1
-    DEG(6,111,5) = 0
-    DEG(6,111,6) = 0
-    DEG(6,111,7) = 1
-    DEG(6,111,8) = 0
-    DEG(6,111,9) = 1
-    DEG(6,111,10) = 0
-    DEG(6,111,11) = 0
-    DEG(6,111,12) = 0
-  COEF(6,111) = (-1.591286253837374, 0)
-    DEG(6,112,1) = 0
-    DEG(6,112,2) = 0
-    DEG(6,112,3) = 1
-    DEG(6,112,4) = 1
-    DEG(6,112,5) = 0
-    DEG(6,112,6) = 0
-    DEG(6,112,7) = 1
-    DEG(6,112,8) = 0
-    DEG(6,112,9) = 1
-    DEG(6,112,10) = 0
-    DEG(6,112,11) = 0
-    DEG(6,112,12) = 0
-  COEF(6,112) = (-1.7720055732454296, 0)
-    DEG(6,113,1) = 0
-    DEG(6,113,2) = 0
-    DEG(6,113,3) = 0
-    DEG(6,113,4) = 2
-    DEG(6,113,5) = 0
-    DEG(6,113,6) = 0
-    DEG(6,113,7) = 1
-    DEG(6,113,8) = 0
-    DEG(6,113,9) = 1
-    DEG(6,113,10) = 0
-    DEG(6,113,11) = 0
-    DEG(6,113,12) = 0
-  COEF(6,113) = (-0.3918206103707267, 0)
-    DEG(6,114,1) = 1
-    DEG(6,114,2) = 0
-    DEG(6,114,3) = 0
-    DEG(6,114,4) = 0
-    DEG(6,114,5) = 1
-    DEG(6,114,6) = 0
-    DEG(6,114,7) = 1
-    DEG(6,114,8) = 0
-    DEG(6,114,9) = 1
-    DEG(6,114,10) = 0
-    DEG(6,114,11) = 0
-    DEG(6,114,12) = 0
-  COEF(6,114) = (-1.591286253837374, 0)
-    DEG(6,115,1) = 0
-    DEG(6,115,2) = 1
-    DEG(6,115,3) = 0
-    DEG(6,115,4) = 0
-    DEG(6,115,5) = 1
-    DEG(6,115,6) = 0
-    DEG(6,115,7) = 1
-    DEG(6,115,8) = 0
-    DEG(6,115,9) = 1
-    DEG(6,115,10) = 0
-    DEG(6,115,11) = 0
-    DEG(6,115,12) = 0
-  COEF(6,115) = (-1.9828183373850392, 0)
-    DEG(6,116,1) = 0
-    DEG(6,116,2) = 0
-    DEG(6,116,3) = 1
-    DEG(6,116,4) = 0
-    DEG(6,116,5) = 1
-    DEG(6,116,6) = 0
-    DEG(6,116,7) = 1
-    DEG(6,116,8) = 0
-    DEG(6,116,9) = 1
-    DEG(6,116,10) = 0
-    DEG(6,116,11) = 0
-    DEG(6,116,12) = 0
-  COEF(6,116) = (-1.5614419016016583, 0)
-    DEG(6,117,1) = 0
-    DEG(6,117,2) = 0
-    DEG(6,117,3) = 0
-    DEG(6,117,4) = 1
-    DEG(6,117,5) = 1
-    DEG(6,117,6) = 0
-    DEG(6,117,7) = 1
-    DEG(6,117,8) = 0
-    DEG(6,117,9) = 1
-    DEG(6,117,10) = 0
-    DEG(6,117,11) = 0
-    DEG(6,117,12) = 0
-  COEF(6,117) = (1.591286253837374, 0)
-    DEG(6,118,1) = 0
-    DEG(6,118,2) = 0
-    DEG(6,118,3) = 0
-    DEG(6,118,4) = 0
-    DEG(6,118,5) = 2
-    DEG(6,118,6) = 0
-    DEG(6,118,7) = 1
-    DEG(6,118,8) = 0
-    DEG(6,118,9) = 1
-    DEG(6,118,10) = 0
-    DEG(6,118,11) = 0
-    DEG(6,118,12) = 0
-  COEF(6,118) = (0.9914091686925196, 0)
-    DEG(6,119,1) = 1
-    DEG(6,119,2) = 0
-    DEG(6,119,3) = 0
-    DEG(6,119,4) = 0
-    DEG(6,119,5) = 0
-    DEG(6,119,6) = 1
-    DEG(6,119,7) = 1
-    DEG(6,119,8) = 0
-    DEG(6,119,9) = 1
-    DEG(6,119,10) = 0
-    DEG(6,119,11) = 0
-    DEG(6,119,12) = 0
-  COEF(6,119) = (-1.7720055732454296, 0)
-    DEG(6,120,1) = 0
-    DEG(6,120,2) = 1
-    DEG(6,120,3) = 0
-    DEG(6,120,4) = 0
-    DEG(6,120,5) = 0
-    DEG(6,120,6) = 1
-    DEG(6,120,7) = 1
-    DEG(6,120,8) = 0
-    DEG(6,120,9) = 1
-    DEG(6,120,10) = 0
-    DEG(6,120,11) = 0
-    DEG(6,120,12) = 0
-  COEF(6,120) = (-1.5614419016016583, 0)
-    DEG(6,121,1) = 0
-    DEG(6,121,2) = 0
-    DEG(6,121,3) = 1
-    DEG(6,121,4) = 0
-    DEG(6,121,5) = 0
-    DEG(6,121,6) = 1
-    DEG(6,121,7) = 1
-    DEG(6,121,8) = 0
-    DEG(6,121,9) = 1
-    DEG(6,121,10) = 0
-    DEG(6,121,11) = 0
-    DEG(6,121,12) = 0
-  COEF(6,121) = (1.1991771166435858, 0)
-    DEG(6,122,1) = 0
-    DEG(6,122,2) = 0
-    DEG(6,122,3) = 0
-    DEG(6,122,4) = 1
-    DEG(6,122,5) = 0
-    DEG(6,122,6) = 1
-    DEG(6,122,7) = 1
-    DEG(6,122,8) = 0
-    DEG(6,122,9) = 1
-    DEG(6,122,10) = 0
-    DEG(6,122,11) = 0
-    DEG(6,122,12) = 0
-  COEF(6,122) = (1.7720055732454296, 0)
-    DEG(6,123,1) = 0
-    DEG(6,123,2) = 0
-    DEG(6,123,3) = 0
-    DEG(6,123,4) = 0
-    DEG(6,123,5) = 1
-    DEG(6,123,6) = 1
-    DEG(6,123,7) = 1
-    DEG(6,123,8) = 0
-    DEG(6,123,9) = 1
-    DEG(6,123,10) = 0
-    DEG(6,123,11) = 0
-    DEG(6,123,12) = 0
-  COEF(6,123) = (1.5614419016016583, 0)
-    DEG(6,124,1) = 0
-    DEG(6,124,2) = 0
-    DEG(6,124,3) = 0
-    DEG(6,124,4) = 0
-    DEG(6,124,5) = 0
-    DEG(6,124,6) = 2
-    DEG(6,124,7) = 1
-    DEG(6,124,8) = 0
-    DEG(6,124,9) = 1
-    DEG(6,124,10) = 0
-    DEG(6,124,11) = 0
-    DEG(6,124,12) = 0
-  COEF(6,124) = (-0.5995885583217929, 0)
-    DEG(6,125,1) = 1
-    DEG(6,125,2) = 0
-    DEG(6,125,3) = 0
-    DEG(6,125,4) = 1
-    DEG(6,125,5) = 0
-    DEG(6,125,6) = 0
-    DEG(6,125,7) = 0
-    DEG(6,125,8) = 1
-    DEG(6,125,9) = 1
-    DEG(6,125,10) = 0
-    DEG(6,125,11) = 0
-    DEG(6,125,12) = 0
-  COEF(6,125) = (1.0797194499182763, 0)
-    DEG(6,126,1) = 0
-    DEG(6,126,2) = 1
-    DEG(6,126,3) = 0
-    DEG(6,126,4) = 1
-    DEG(6,126,5) = 0
-    DEG(6,126,6) = 0
-    DEG(6,126,7) = 0
-    DEG(6,126,8) = 1
-    DEG(6,126,9) = 1
-    DEG(6,126,10) = 0
-    DEG(6,126,11) = 0
-    DEG(6,126,12) = 0
-  COEF(6,126) = (-0.7880490143260981, 0)
-    DEG(6,127,1) = 0
-    DEG(6,127,2) = 0
-    DEG(6,127,3) = 1
-    DEG(6,127,4) = 1
-    DEG(6,127,5) = 0
-    DEG(6,127,6) = 0
-    DEG(6,127,7) = 0
-    DEG(6,127,8) = 1
-    DEG(6,127,9) = 1
-    DEG(6,127,10) = 0
-    DEG(6,127,11) = 0
-    DEG(6,127,12) = 0
-  COEF(6,127) = (1.9037877679163095, 0)
-    DEG(6,128,1) = 0
-    DEG(6,128,2) = 0
-    DEG(6,128,3) = 0
-    DEG(6,128,4) = 2
-    DEG(6,128,5) = 0
-    DEG(6,128,6) = 0
-    DEG(6,128,7) = 0
-    DEG(6,128,8) = 1
-    DEG(6,128,9) = 1
-    DEG(6,128,10) = 0
-    DEG(6,128,11) = 0
-    DEG(6,128,12) = 0
-  COEF(6,128) = (-0.5398597249591381, 0)
-    DEG(6,129,1) = 1
-    DEG(6,129,2) = 0
-    DEG(6,129,3) = 0
-    DEG(6,129,4) = 0
-    DEG(6,129,5) = 1
-    DEG(6,129,6) = 0
-    DEG(6,129,7) = 0
-    DEG(6,129,8) = 1
-    DEG(6,129,9) = 1
-    DEG(6,129,10) = 0
-    DEG(6,129,11) = 0
-    DEG(6,129,12) = 0
-  COEF(6,129) = (-0.7880490143260981, 0)
-    DEG(6,130,1) = 0
-    DEG(6,130,2) = 1
-    DEG(6,130,3) = 0
-    DEG(6,130,4) = 0
-    DEG(6,130,5) = 1
-    DEG(6,130,6) = 0
-    DEG(6,130,7) = 0
-    DEG(6,130,8) = 1
-    DEG(6,130,9) = 1
-    DEG(6,130,10) = 0
-    DEG(6,130,11) = 0
-    DEG(6,130,12) = 0
-  COEF(6,130) = (0.676781642350236, 0)
-    DEG(6,131,1) = 0
-    DEG(6,131,2) = 0
-    DEG(6,131,3) = 1
-    DEG(6,131,4) = 0
-    DEG(6,131,5) = 1
-    DEG(6,131,6) = 0
-    DEG(6,131,7) = 0
-    DEG(6,131,8) = 1
-    DEG(6,131,9) = 1
-    DEG(6,131,10) = 0
-    DEG(6,131,11) = 0
-    DEG(6,131,12) = 0
-  COEF(6,131) = (-2.52348520398015, 0)
-    DEG(6,132,1) = 0
-    DEG(6,132,2) = 0
-    DEG(6,132,3) = 0
-    DEG(6,132,4) = 1
-    DEG(6,132,5) = 1
-    DEG(6,132,6) = 0
-    DEG(6,132,7) = 0
-    DEG(6,132,8) = 1
-    DEG(6,132,9) = 1
-    DEG(6,132,10) = 0
-    DEG(6,132,11) = 0
-    DEG(6,132,12) = 0
-  COEF(6,132) = (0.7880490143260981, 0)
-    DEG(6,133,1) = 0
-    DEG(6,133,2) = 0
-    DEG(6,133,3) = 0
-    DEG(6,133,4) = 0
-    DEG(6,133,5) = 2
-    DEG(6,133,6) = 0
-    DEG(6,133,7) = 0
-    DEG(6,133,8) = 1
-    DEG(6,133,9) = 1
-    DEG(6,133,10) = 0
-    DEG(6,133,11) = 0
-    DEG(6,133,12) = 0
-  COEF(6,133) = (-0.338390821175118, 0)
-    DEG(6,134,1) = 1
-    DEG(6,134,2) = 0
-    DEG(6,134,3) = 0
-    DEG(6,134,4) = 0
-    DEG(6,134,5) = 0
-    DEG(6,134,6) = 1
-    DEG(6,134,7) = 0
-    DEG(6,134,8) = 1
-    DEG(6,134,9) = 1
-    DEG(6,134,10) = 0
-    DEG(6,134,11) = 0
-    DEG(6,134,12) = 0
-  COEF(6,134) = (1.9037877679163095, 0)
-    DEG(6,135,1) = 0
-    DEG(6,135,2) = 1
-    DEG(6,135,3) = 0
-    DEG(6,135,4) = 0
-    DEG(6,135,5) = 0
-    DEG(6,135,6) = 1
-    DEG(6,135,7) = 0
-    DEG(6,135,8) = 1
-    DEG(6,135,9) = 1
-    DEG(6,135,10) = 0
-    DEG(6,135,11) = 0
-    DEG(6,135,12) = 0
-  COEF(6,135) = (-2.52348520398015, 0)
-    DEG(6,136,1) = 0
-    DEG(6,136,2) = 0
-    DEG(6,136,3) = 1
-    DEG(6,136,4) = 0
-    DEG(6,136,5) = 0
-    DEG(6,136,6) = 1
-    DEG(6,136,7) = 0
-    DEG(6,136,8) = 1
-    DEG(6,136,9) = 1
-    DEG(6,136,10) = 0
-    DEG(6,136,11) = 0
-    DEG(6,136,12) = 0
-  COEF(6,136) = (-1.7565010922685123, 0)
-    DEG(6,137,1) = 0
-    DEG(6,137,2) = 0
-    DEG(6,137,3) = 0
-    DEG(6,137,4) = 1
-    DEG(6,137,5) = 0
-    DEG(6,137,6) = 1
-    DEG(6,137,7) = 0
-    DEG(6,137,8) = 1
-    DEG(6,137,9) = 1
-    DEG(6,137,10) = 0
-    DEG(6,137,11) = 0
-    DEG(6,137,12) = 0
-  COEF(6,137) = (-1.9037877679163095, 0)
-    DEG(6,138,1) = 0
-    DEG(6,138,2) = 0
-    DEG(6,138,3) = 0
-    DEG(6,138,4) = 0
-    DEG(6,138,5) = 1
-    DEG(6,138,6) = 1
-    DEG(6,138,7) = 0
-    DEG(6,138,8) = 1
-    DEG(6,138,9) = 1
-    DEG(6,138,10) = 0
-    DEG(6,138,11) = 0
-    DEG(6,138,12) = 0
-  COEF(6,138) = (2.52348520398015, 0)
-    DEG(6,139,1) = 0
-    DEG(6,139,2) = 0
-    DEG(6,139,3) = 0
-    DEG(6,139,4) = 0
-    DEG(6,139,5) = 0
-    DEG(6,139,6) = 2
-    DEG(6,139,7) = 0
-    DEG(6,139,8) = 1
-    DEG(6,139,9) = 1
-    DEG(6,139,10) = 0
-    DEG(6,139,11) = 0
-    DEG(6,139,12) = 0
-  COEF(6,139) = (0.8782505461342561, 0)
-    DEG(6,140,1) = 1
-    DEG(6,140,2) = 0
-    DEG(6,140,3) = 0
-    DEG(6,140,4) = 1
-    DEG(6,140,5) = 0
-    DEG(6,140,6) = 0
-    DEG(6,140,7) = 0
-    DEG(6,140,8) = 0
-    DEG(6,140,9) = 2
-    DEG(6,140,10) = 0
-    DEG(6,140,11) = 0
-    DEG(6,140,12) = 0
-  COEF(6,140) = (0.2325623311341464, 0)
-    DEG(6,141,1) = 0
-    DEG(6,141,2) = 1
-    DEG(6,141,3) = 0
-    DEG(6,141,4) = 1
-    DEG(6,141,5) = 0
-    DEG(6,141,6) = 0
-    DEG(6,141,7) = 0
-    DEG(6,141,8) = 0
-    DEG(6,141,9) = 2
-    DEG(6,141,10) = 0
-    DEG(6,141,11) = 0
-    DEG(6,141,12) = 0
-  COEF(6,141) = (-0.8166616767108147, 0)
-    DEG(6,142,1) = 0
-    DEG(6,142,2) = 0
-    DEG(6,142,3) = 1
-    DEG(6,142,4) = 1
-    DEG(6,142,5) = 0
-    DEG(6,142,6) = 0
-    DEG(6,142,7) = 0
-    DEG(6,142,8) = 0
-    DEG(6,142,9) = 2
-    DEG(6,142,10) = 0
-    DEG(6,142,11) = 0
-    DEG(6,142,12) = 0
-  COEF(6,142) = (-0.9210726289945649, 0)
-    DEG(6,143,1) = 0
-    DEG(6,143,2) = 0
-    DEG(6,143,3) = 0
-    DEG(6,143,4) = 2
-    DEG(6,143,5) = 0
-    DEG(6,143,6) = 0
-    DEG(6,143,7) = 0
-    DEG(6,143,8) = 0
-    DEG(6,143,9) = 2
-    DEG(6,143,10) = 0
-    DEG(6,143,11) = 0
-    DEG(6,143,12) = 0
-  COEF(6,143) = (-0.1162811655670732, 0)
-    DEG(6,144,1) = 1
-    DEG(6,144,2) = 0
-    DEG(6,144,3) = 0
-    DEG(6,144,4) = 0
-    DEG(6,144,5) = 1
-    DEG(6,144,6) = 0
-    DEG(6,144,7) = 0
-    DEG(6,144,8) = 0
-    DEG(6,144,9) = 2
-    DEG(6,144,10) = 0
-    DEG(6,144,11) = 0
-    DEG(6,144,12) = 0
-  COEF(6,144) = (-0.8166616767108147, 0)
-    DEG(6,145,1) = 0
-    DEG(6,145,2) = 1
-    DEG(6,145,3) = 0
-    DEG(6,145,4) = 0
-    DEG(6,145,5) = 1
-    DEG(6,145,6) = 0
-    DEG(6,145,7) = 0
-    DEG(6,145,8) = 0
-    DEG(6,145,9) = 2
-    DEG(6,145,10) = 0
-    DEG(6,145,11) = 0
-    DEG(6,145,12) = 0
-  COEF(6,145) = (1.1835202012628658, 0)
-    DEG(6,146,1) = 0
-    DEG(6,146,2) = 0
-    DEG(6,146,3) = 1
-    DEG(6,146,4) = 0
-    DEG(6,146,5) = 1
-    DEG(6,146,6) = 0
-    DEG(6,146,7) = 0
-    DEG(6,146,8) = 0
-    DEG(6,146,9) = 2
-    DEG(6,146,10) = 0
-    DEG(6,146,11) = 0
-    DEG(6,146,12) = 0
-  COEF(6,146) = (0.31395782579531734, 0)
-    DEG(6,147,1) = 0
-    DEG(6,147,2) = 0
-    DEG(6,147,3) = 0
-    DEG(6,147,4) = 1
-    DEG(6,147,5) = 1
-    DEG(6,147,6) = 0
-    DEG(6,147,7) = 0
-    DEG(6,147,8) = 0
-    DEG(6,147,9) = 2
-    DEG(6,147,10) = 0
-    DEG(6,147,11) = 0
-    DEG(6,147,12) = 0
-  COEF(6,147) = (0.8166616767108147, 0)
-    DEG(6,148,1) = 0
-    DEG(6,148,2) = 0
-    DEG(6,148,3) = 0
-    DEG(6,148,4) = 0
-    DEG(6,148,5) = 2
-    DEG(6,148,6) = 0
-    DEG(6,148,7) = 0
-    DEG(6,148,8) = 0
-    DEG(6,148,9) = 2
-    DEG(6,148,10) = 0
-    DEG(6,148,11) = 0
-    DEG(6,148,12) = 0
-  COEF(6,148) = (-0.5917601006314329, 0)
-    DEG(6,149,1) = 1
-    DEG(6,149,2) = 0
-    DEG(6,149,3) = 0
-    DEG(6,149,4) = 0
-    DEG(6,149,5) = 0
-    DEG(6,149,6) = 1
-    DEG(6,149,7) = 0
-    DEG(6,149,8) = 0
-    DEG(6,149,9) = 2
-    DEG(6,149,10) = 0
-    DEG(6,149,11) = 0
-    DEG(6,149,12) = 0
-  COEF(6,149) = (-0.9210726289945649, 0)
-    DEG(6,150,1) = 0
-    DEG(6,150,2) = 1
-    DEG(6,150,3) = 0
-    DEG(6,150,4) = 0
-    DEG(6,150,5) = 0
-    DEG(6,150,6) = 1
-    DEG(6,150,7) = 0
-    DEG(6,150,8) = 0
-    DEG(6,150,9) = 2
-    DEG(6,150,10) = 0
-    DEG(6,150,11) = 0
-    DEG(6,150,12) = 0
-  COEF(6,150) = (0.31395782579531734, 0)
-    DEG(6,151,1) = 0
-    DEG(6,151,2) = 0
-    DEG(6,151,3) = 1
-    DEG(6,151,4) = 0
-    DEG(6,151,5) = 0
-    DEG(6,151,6) = 1
-    DEG(6,151,7) = 0
-    DEG(6,151,8) = 0
-    DEG(6,151,9) = 2
-    DEG(6,151,10) = 0
-    DEG(6,151,11) = 0
-    DEG(6,151,12) = 0
-  COEF(6,151) = (-1.4160825323970123, 0)
-    DEG(6,152,1) = 0
-    DEG(6,152,2) = 0
-    DEG(6,152,3) = 0
-    DEG(6,152,4) = 1
-    DEG(6,152,5) = 0
-    DEG(6,152,6) = 1
-    DEG(6,152,7) = 0
-    DEG(6,152,8) = 0
-    DEG(6,152,9) = 2
-    DEG(6,152,10) = 0
-    DEG(6,152,11) = 0
-    DEG(6,152,12) = 0
-  COEF(6,152) = (0.9210726289945649, 0)
-    DEG(6,153,1) = 0
-    DEG(6,153,2) = 0
-    DEG(6,153,3) = 0
-    DEG(6,153,4) = 0
-    DEG(6,153,5) = 1
-    DEG(6,153,6) = 1
-    DEG(6,153,7) = 0
-    DEG(6,153,8) = 0
-    DEG(6,153,9) = 2
-    DEG(6,153,10) = 0
-    DEG(6,153,11) = 0
-    DEG(6,153,12) = 0
-  COEF(6,153) = (-0.31395782579531734, 0)
-    DEG(6,154,1) = 0
-    DEG(6,154,2) = 0
-    DEG(6,154,3) = 0
-    DEG(6,154,4) = 0
-    DEG(6,154,5) = 0
-    DEG(6,154,6) = 2
-    DEG(6,154,7) = 0
-    DEG(6,154,8) = 0
-    DEG(6,154,9) = 2
-    DEG(6,154,10) = 0
-    DEG(6,154,11) = 0
-    DEG(6,154,12) = 0
-  COEF(6,154) = (0.7080412661985062, 0)
-    DEG(6,155,1) = 0
-    DEG(6,155,2) = 0
-    DEG(6,155,3) = 0
-    DEG(6,155,4) = 0
-    DEG(6,155,5) = 0
-    DEG(6,155,6) = 0
-    DEG(6,155,7) = 0
-    DEG(6,155,8) = 0
-    DEG(6,155,9) = 0
-    DEG(6,155,10) = 1
-    DEG(6,155,11) = 0
-    DEG(6,155,12) = 0
-  COEF(6,155) = (-3.382149934013522, 0)
-    DEG(6,156,1) = 1
-    DEG(6,156,2) = 0
-    DEG(6,156,3) = 0
-    DEG(6,156,4) = 1
-    DEG(6,156,5) = 0
-    DEG(6,156,6) = 0
-    DEG(6,156,7) = 0
-    DEG(6,156,8) = 0
-    DEG(6,156,9) = 0
-    DEG(6,156,10) = 1
-    DEG(6,156,11) = 0
-    DEG(6,156,12) = 0
-  COEF(6,156) = (3.382149934013522, 0)
-    DEG(6,157,1) = 1
-    DEG(6,157,2) = 0
-    DEG(6,157,3) = 0
-    DEG(6,157,4) = 0
-    DEG(6,157,5) = 1
-    DEG(6,157,6) = 0
-    DEG(6,157,7) = 0
-    DEG(6,157,8) = 0
-    DEG(6,157,9) = 0
-    DEG(6,157,10) = 1
-    DEG(6,157,11) = 0
-    DEG(6,157,12) = 0
-  COEF(6,157) = (-0.042948398783605866, 0)
-    DEG(6,158,1) = 1
-    DEG(6,158,2) = 0
-    DEG(6,158,3) = 0
-    DEG(6,158,4) = 0
-    DEG(6,158,5) = 0
-    DEG(6,158,6) = 1
-    DEG(6,158,7) = 0
-    DEG(6,158,8) = 0
-    DEG(6,158,9) = 0
-    DEG(6,158,10) = 1
-    DEG(6,158,11) = 0
-    DEG(6,158,12) = 0
-  COEF(6,158) = (1.352633449972227, 0)
-    DEG(6,159,1) = 0
-    DEG(6,159,2) = 0
-    DEG(6,159,3) = 0
-    DEG(6,159,4) = 0
-    DEG(6,159,5) = 0
-    DEG(6,159,6) = 0
-    DEG(6,159,7) = 1
-    DEG(6,159,8) = 0
-    DEG(6,159,9) = 0
-    DEG(6,159,10) = 1
-    DEG(6,159,11) = 0
-    DEG(6,159,12) = 0
-  COEF(6,159) = (-0.39729264378615137, 0)
-    DEG(6,160,1) = 1
-    DEG(6,160,2) = 0
-    DEG(6,160,3) = 0
-    DEG(6,160,4) = 1
-    DEG(6,160,5) = 0
-    DEG(6,160,6) = 0
-    DEG(6,160,7) = 1
-    DEG(6,160,8) = 0
-    DEG(6,160,9) = 0
-    DEG(6,160,10) = 1
-    DEG(6,160,11) = 0
-    DEG(6,160,12) = 0
-  COEF(6,160) = (0.39729264378615137, 0)
-    DEG(6,161,1) = 1
-    DEG(6,161,2) = 0
-    DEG(6,161,3) = 0
-    DEG(6,161,4) = 0
-    DEG(6,161,5) = 1
-    DEG(6,161,6) = 0
-    DEG(6,161,7) = 1
-    DEG(6,161,8) = 0
-    DEG(6,161,9) = 0
-    DEG(6,161,10) = 1
-    DEG(6,161,11) = 0
-    DEG(6,161,12) = 0
-  COEF(6,161) = (-0.34958936744862956, 0)
-    DEG(6,162,1) = 1
-    DEG(6,162,2) = 0
-    DEG(6,162,3) = 0
-    DEG(6,162,4) = 0
-    DEG(6,162,5) = 0
-    DEG(6,162,6) = 1
-    DEG(6,162,7) = 1
-    DEG(6,162,8) = 0
-    DEG(6,162,9) = 0
-    DEG(6,162,10) = 1
-    DEG(6,162,11) = 0
-    DEG(6,162,12) = 0
-  COEF(6,162) = (0.762225277598508, 0)
-    DEG(6,163,1) = 0
-    DEG(6,163,2) = 0
-    DEG(6,163,3) = 0
-    DEG(6,163,4) = 0
-    DEG(6,163,5) = 0
-    DEG(6,163,6) = 0
-    DEG(6,163,7) = 0
-    DEG(6,163,8) = 1
-    DEG(6,163,9) = 0
-    DEG(6,163,10) = 1
-    DEG(6,163,11) = 0
-    DEG(6,163,12) = 0
-  COEF(6,163) = (-1.6743126643663655, 0)
-    DEG(6,164,1) = 1
-    DEG(6,164,2) = 0
-    DEG(6,164,3) = 0
-    DEG(6,164,4) = 1
-    DEG(6,164,5) = 0
-    DEG(6,164,6) = 0
-    DEG(6,164,7) = 0
-    DEG(6,164,8) = 1
-    DEG(6,164,9) = 0
-    DEG(6,164,10) = 1
-    DEG(6,164,11) = 0
-    DEG(6,164,12) = 0
-  COEF(6,164) = (1.6743126643663655, 0)
-    DEG(6,165,1) = 1
-    DEG(6,165,2) = 0
-    DEG(6,165,3) = 0
-    DEG(6,165,4) = 0
-    DEG(6,165,5) = 1
-    DEG(6,165,6) = 0
-    DEG(6,165,7) = 0
-    DEG(6,165,8) = 1
-    DEG(6,165,9) = 0
-    DEG(6,165,10) = 1
-    DEG(6,165,11) = 0
-    DEG(6,165,12) = 0
-  COEF(6,165) = (-2.2434519247613722, 0)
-    DEG(6,166,1) = 1
-    DEG(6,166,2) = 0
-    DEG(6,166,3) = 0
-    DEG(6,166,4) = 0
-    DEG(6,166,5) = 0
-    DEG(6,166,6) = 1
-    DEG(6,166,7) = 0
-    DEG(6,166,8) = 1
-    DEG(6,166,9) = 0
-    DEG(6,166,10) = 1
-    DEG(6,166,11) = 0
-    DEG(6,166,12) = 0
-  COEF(6,166) = (1.6863844601657187, 0)
-    DEG(6,167,1) = 0
-    DEG(6,167,2) = 0
-    DEG(6,167,3) = 0
-    DEG(6,167,4) = 0
-    DEG(6,167,5) = 0
-    DEG(6,167,6) = 0
-    DEG(6,167,7) = 0
-    DEG(6,167,8) = 0
-    DEG(6,167,9) = 1
-    DEG(6,167,10) = 1
-    DEG(6,167,11) = 0
-    DEG(6,167,12) = 0
-  COEF(6,167) = (-0.31414170667924596, 0)
-    DEG(6,168,1) = 1
-    DEG(6,168,2) = 0
-    DEG(6,168,3) = 0
-    DEG(6,168,4) = 1
-    DEG(6,168,5) = 0
-    DEG(6,168,6) = 0
-    DEG(6,168,7) = 0
-    DEG(6,168,8) = 0
-    DEG(6,168,9) = 1
-    DEG(6,168,10) = 1
-    DEG(6,168,11) = 0
-    DEG(6,168,12) = 0
-  COEF(6,168) = (0.31414170667924596, 0)
-    DEG(6,169,1) = 1
-    DEG(6,169,2) = 0
-    DEG(6,169,3) = 0
-    DEG(6,169,4) = 0
-    DEG(6,169,5) = 1
-    DEG(6,169,6) = 0
-    DEG(6,169,7) = 0
-    DEG(6,169,8) = 0
-    DEG(6,169,9) = 1
-    DEG(6,169,10) = 1
-    DEG(6,169,11) = 0
-    DEG(6,169,12) = 0
-  COEF(6,169) = (-1.9485294423729955, 0)
-    DEG(6,170,1) = 1
-    DEG(6,170,2) = 0
-    DEG(6,170,3) = 0
-    DEG(6,170,4) = 0
-    DEG(6,170,5) = 0
-    DEG(6,170,6) = 1
-    DEG(6,170,7) = 0
-    DEG(6,170,8) = 0
-    DEG(6,170,9) = 1
-    DEG(6,170,10) = 1
-    DEG(6,170,11) = 0
-    DEG(6,170,12) = 0
-  COEF(6,170) = (-2.7100698454638046, 0)
-    DEG(6,171,1) = 0
-    DEG(6,171,2) = 0
-    DEG(6,171,3) = 0
-    DEG(6,171,4) = 0
-    DEG(6,171,5) = 0
-    DEG(6,171,6) = 0
-    DEG(6,171,7) = 0
-    DEG(6,171,8) = 0
-    DEG(6,171,9) = 0
-    DEG(6,171,10) = 0
-    DEG(6,171,11) = 1
-    DEG(6,171,12) = 0
-  COEF(6,171) = (0.042948398783605866, 0)
-    DEG(6,172,1) = 0
-    DEG(6,172,2) = 1
-    DEG(6,172,3) = 0
-    DEG(6,172,4) = 1
-    DEG(6,172,5) = 0
-    DEG(6,172,6) = 0
-    DEG(6,172,7) = 0
-    DEG(6,172,8) = 0
-    DEG(6,172,9) = 0
-    DEG(6,172,10) = 0
-    DEG(6,172,11) = 1
-    DEG(6,172,12) = 0
-  COEF(6,172) = (3.382149934013522, 0)
-    DEG(6,173,1) = 0
-    DEG(6,173,2) = 1
-    DEG(6,173,3) = 0
-    DEG(6,173,4) = 0
-    DEG(6,173,5) = 1
-    DEG(6,173,6) = 0
-    DEG(6,173,7) = 0
-    DEG(6,173,8) = 0
-    DEG(6,173,9) = 0
-    DEG(6,173,10) = 0
-    DEG(6,173,11) = 1
-    DEG(6,173,12) = 0
-  COEF(6,173) = (-0.042948398783605866, 0)
-    DEG(6,174,1) = 0
-    DEG(6,174,2) = 1
-    DEG(6,174,3) = 0
-    DEG(6,174,4) = 0
-    DEG(6,174,5) = 0
-    DEG(6,174,6) = 1
-    DEG(6,174,7) = 0
-    DEG(6,174,8) = 0
-    DEG(6,174,9) = 0
-    DEG(6,174,10) = 0
-    DEG(6,174,11) = 1
-    DEG(6,174,12) = 0
-  COEF(6,174) = (1.352633449972227, 0)
-    DEG(6,175,1) = 0
-    DEG(6,175,2) = 0
-    DEG(6,175,3) = 0
-    DEG(6,175,4) = 0
-    DEG(6,175,5) = 0
-    DEG(6,175,6) = 0
-    DEG(6,175,7) = 1
-    DEG(6,175,8) = 0
-    DEG(6,175,9) = 0
-    DEG(6,175,10) = 0
-    DEG(6,175,11) = 1
-    DEG(6,175,12) = 0
-  COEF(6,175) = (0.34958936744862956, 0)
-    DEG(6,176,1) = 0
-    DEG(6,176,2) = 1
-    DEG(6,176,3) = 0
-    DEG(6,176,4) = 1
-    DEG(6,176,5) = 0
-    DEG(6,176,6) = 0
-    DEG(6,176,7) = 1
-    DEG(6,176,8) = 0
-    DEG(6,176,9) = 0
-    DEG(6,176,10) = 0
-    DEG(6,176,11) = 1
-    DEG(6,176,12) = 0
-  COEF(6,176) = (0.39729264378615137, 0)
-    DEG(6,177,1) = 0
-    DEG(6,177,2) = 1
-    DEG(6,177,3) = 0
-    DEG(6,177,4) = 0
-    DEG(6,177,5) = 1
-    DEG(6,177,6) = 0
-    DEG(6,177,7) = 1
-    DEG(6,177,8) = 0
-    DEG(6,177,9) = 0
-    DEG(6,177,10) = 0
-    DEG(6,177,11) = 1
-    DEG(6,177,12) = 0
-  COEF(6,177) = (-0.34958936744862956, 0)
-    DEG(6,178,1) = 0
-    DEG(6,178,2) = 1
-    DEG(6,178,3) = 0
-    DEG(6,178,4) = 0
-    DEG(6,178,5) = 0
-    DEG(6,178,6) = 1
-    DEG(6,178,7) = 1
-    DEG(6,178,8) = 0
-    DEG(6,178,9) = 0
-    DEG(6,178,10) = 0
-    DEG(6,178,11) = 1
-    DEG(6,178,12) = 0
-  COEF(6,178) = (0.762225277598508, 0)
-    DEG(6,179,1) = 0
-    DEG(6,179,2) = 0
-    DEG(6,179,3) = 0
-    DEG(6,179,4) = 0
-    DEG(6,179,5) = 0
-    DEG(6,179,6) = 0
-    DEG(6,179,7) = 0
-    DEG(6,179,8) = 1
-    DEG(6,179,9) = 0
-    DEG(6,179,10) = 0
-    DEG(6,179,11) = 1
-    DEG(6,179,12) = 0
-  COEF(6,179) = (2.2434519247613722, 0)
-    DEG(6,180,1) = 0
-    DEG(6,180,2) = 1
-    DEG(6,180,3) = 0
-    DEG(6,180,4) = 1
-    DEG(6,180,5) = 0
-    DEG(6,180,6) = 0
-    DEG(6,180,7) = 0
-    DEG(6,180,8) = 1
-    DEG(6,180,9) = 0
-    DEG(6,180,10) = 0
-    DEG(6,180,11) = 1
-    DEG(6,180,12) = 0
-  COEF(6,180) = (1.6743126643663655, 0)
-    DEG(6,181,1) = 0
-    DEG(6,181,2) = 1
-    DEG(6,181,3) = 0
-    DEG(6,181,4) = 0
-    DEG(6,181,5) = 1
-    DEG(6,181,6) = 0
-    DEG(6,181,7) = 0
-    DEG(6,181,8) = 1
-    DEG(6,181,9) = 0
-    DEG(6,181,10) = 0
-    DEG(6,181,11) = 1
-    DEG(6,181,12) = 0
-  COEF(6,181) = (-2.2434519247613722, 0)
-    DEG(6,182,1) = 0
-    DEG(6,182,2) = 1
-    DEG(6,182,3) = 0
-    DEG(6,182,4) = 0
-    DEG(6,182,5) = 0
-    DEG(6,182,6) = 1
-    DEG(6,182,7) = 0
-    DEG(6,182,8) = 1
-    DEG(6,182,9) = 0
-    DEG(6,182,10) = 0
-    DEG(6,182,11) = 1
-    DEG(6,182,12) = 0
-  COEF(6,182) = (1.6863844601657187, 0)
-    DEG(6,183,1) = 0
-    DEG(6,183,2) = 0
-    DEG(6,183,3) = 0
-    DEG(6,183,4) = 0
-    DEG(6,183,5) = 0
-    DEG(6,183,6) = 0
-    DEG(6,183,7) = 0
-    DEG(6,183,8) = 0
-    DEG(6,183,9) = 1
-    DEG(6,183,10) = 0
-    DEG(6,183,11) = 1
-    DEG(6,183,12) = 0
-  COEF(6,183) = (1.9485294423729955, 0)
-    DEG(6,184,1) = 0
-    DEG(6,184,2) = 1
-    DEG(6,184,3) = 0
-    DEG(6,184,4) = 1
-    DEG(6,184,5) = 0
-    DEG(6,184,6) = 0
-    DEG(6,184,7) = 0
-    DEG(6,184,8) = 0
-    DEG(6,184,9) = 1
-    DEG(6,184,10) = 0
-    DEG(6,184,11) = 1
-    DEG(6,184,12) = 0
-  COEF(6,184) = (0.31414170667924596, 0)
-    DEG(6,185,1) = 0
-    DEG(6,185,2) = 1
-    DEG(6,185,3) = 0
-    DEG(6,185,4) = 0
-    DEG(6,185,5) = 1
-    DEG(6,185,6) = 0
-    DEG(6,185,7) = 0
-    DEG(6,185,8) = 0
-    DEG(6,185,9) = 1
-    DEG(6,185,10) = 0
-    DEG(6,185,11) = 1
-    DEG(6,185,12) = 0
-  COEF(6,185) = (-1.9485294423729955, 0)
-    DEG(6,186,1) = 0
-    DEG(6,186,2) = 1
-    DEG(6,186,3) = 0
-    DEG(6,186,4) = 0
-    DEG(6,186,5) = 0
-    DEG(6,186,6) = 1
-    DEG(6,186,7) = 0
-    DEG(6,186,8) = 0
-    DEG(6,186,9) = 1
-    DEG(6,186,10) = 0
-    DEG(6,186,11) = 1
-    DEG(6,186,12) = 0
-  COEF(6,186) = (-2.7100698454638046, 0)
-    DEG(6,187,1) = 0
-    DEG(6,187,2) = 0
-    DEG(6,187,3) = 0
-    DEG(6,187,4) = 0
-    DEG(6,187,5) = 0
-    DEG(6,187,6) = 0
-    DEG(6,187,7) = 0
-    DEG(6,187,8) = 0
-    DEG(6,187,9) = 0
-    DEG(6,187,10) = 0
-    DEG(6,187,11) = 0
-    DEG(6,187,12) = 1
-  COEF(6,187) = (-1.352633449972227, 0)
-    DEG(6,188,1) = 0
-    DEG(6,188,2) = 0
-    DEG(6,188,3) = 1
-    DEG(6,188,4) = 1
-    DEG(6,188,5) = 0
-    DEG(6,188,6) = 0
-    DEG(6,188,7) = 0
-    DEG(6,188,8) = 0
-    DEG(6,188,9) = 0
-    DEG(6,188,10) = 0
-    DEG(6,188,11) = 0
-    DEG(6,188,12) = 1
-  COEF(6,188) = (3.382149934013522, 0)
-    DEG(6,189,1) = 0
-    DEG(6,189,2) = 0
-    DEG(6,189,3) = 1
-    DEG(6,189,4) = 0
-    DEG(6,189,5) = 1
-    DEG(6,189,6) = 0
-    DEG(6,189,7) = 0
-    DEG(6,189,8) = 0
-    DEG(6,189,9) = 0
-    DEG(6,189,10) = 0
-    DEG(6,189,11) = 0
-    DEG(6,189,12) = 1
-  COEF(6,189) = (-0.042948398783605866, 0)
-    DEG(6,190,1) = 0
-    DEG(6,190,2) = 0
-    DEG(6,190,3) = 1
-    DEG(6,190,4) = 0
-    DEG(6,190,5) = 0
-    DEG(6,190,6) = 1
-    DEG(6,190,7) = 0
-    DEG(6,190,8) = 0
-    DEG(6,190,9) = 0
-    DEG(6,190,10) = 0
-    DEG(6,190,11) = 0
-    DEG(6,190,12) = 1
-  COEF(6,190) = (1.352633449972227, 0)
-    DEG(6,191,1) = 0
-    DEG(6,191,2) = 0
-    DEG(6,191,3) = 0
-    DEG(6,191,4) = 0
-    DEG(6,191,5) = 0
-    DEG(6,191,6) = 0
-    DEG(6,191,7) = 1
-    DEG(6,191,8) = 0
-    DEG(6,191,9) = 0
-    DEG(6,191,10) = 0
-    DEG(6,191,11) = 0
-    DEG(6,191,12) = 1
-  COEF(6,191) = (-0.762225277598508, 0)
-    DEG(6,192,1) = 0
-    DEG(6,192,2) = 0
-    DEG(6,192,3) = 1
-    DEG(6,192,4) = 1
-    DEG(6,192,5) = 0
-    DEG(6,192,6) = 0
-    DEG(6,192,7) = 1
-    DEG(6,192,8) = 0
-    DEG(6,192,9) = 0
-    DEG(6,192,10) = 0
-    DEG(6,192,11) = 0
-    DEG(6,192,12) = 1
-  COEF(6,192) = (0.39729264378615137, 0)
-    DEG(6,193,1) = 0
-    DEG(6,193,2) = 0
-    DEG(6,193,3) = 1
-    DEG(6,193,4) = 0
-    DEG(6,193,5) = 1
-    DEG(6,193,6) = 0
-    DEG(6,193,7) = 1
-    DEG(6,193,8) = 0
-    DEG(6,193,9) = 0
-    DEG(6,193,10) = 0
-    DEG(6,193,11) = 0
-    DEG(6,193,12) = 1
-  COEF(6,193) = (-0.34958936744862956, 0)
-    DEG(6,194,1) = 0
-    DEG(6,194,2) = 0
-    DEG(6,194,3) = 1
-    DEG(6,194,4) = 0
-    DEG(6,194,5) = 0
-    DEG(6,194,6) = 1
-    DEG(6,194,7) = 1
-    DEG(6,194,8) = 0
-    DEG(6,194,9) = 0
-    DEG(6,194,10) = 0
-    DEG(6,194,11) = 0
-    DEG(6,194,12) = 1
-  COEF(6,194) = (0.762225277598508, 0)
-    DEG(6,195,1) = 0
-    DEG(6,195,2) = 0
-    DEG(6,195,3) = 0
-    DEG(6,195,4) = 0
-    DEG(6,195,5) = 0
-    DEG(6,195,6) = 0
-    DEG(6,195,7) = 0
-    DEG(6,195,8) = 1
-    DEG(6,195,9) = 0
-    DEG(6,195,10) = 0
-    DEG(6,195,11) = 0
-    DEG(6,195,12) = 1
-  COEF(6,195) = (-1.6863844601657187, 0)
-    DEG(6,196,1) = 0
-    DEG(6,196,2) = 0
-    DEG(6,196,3) = 1
-    DEG(6,196,4) = 1
-    DEG(6,196,5) = 0
-    DEG(6,196,6) = 0
-    DEG(6,196,7) = 0
-    DEG(6,196,8) = 1
-    DEG(6,196,9) = 0
-    DEG(6,196,10) = 0
-    DEG(6,196,11) = 0
-    DEG(6,196,12) = 1
-  COEF(6,196) = (1.6743126643663655, 0)
-    DEG(6,197,1) = 0
-    DEG(6,197,2) = 0
-    DEG(6,197,3) = 1
-    DEG(6,197,4) = 0
-    DEG(6,197,5) = 1
-    DEG(6,197,6) = 0
-    DEG(6,197,7) = 0
-    DEG(6,197,8) = 1
-    DEG(6,197,9) = 0
-    DEG(6,197,10) = 0
-    DEG(6,197,11) = 0
-    DEG(6,197,12) = 1
-  COEF(6,197) = (-2.2434519247613722, 0)
-    DEG(6,198,1) = 0
-    DEG(6,198,2) = 0
-    DEG(6,198,3) = 1
-    DEG(6,198,4) = 0
-    DEG(6,198,5) = 0
-    DEG(6,198,6) = 1
-    DEG(6,198,7) = 0
-    DEG(6,198,8) = 1
-    DEG(6,198,9) = 0
-    DEG(6,198,10) = 0
-    DEG(6,198,11) = 0
-    DEG(6,198,12) = 1
-  COEF(6,198) = (1.6863844601657187, 0)
-    DEG(6,199,1) = 0
-    DEG(6,199,2) = 0
-    DEG(6,199,3) = 0
-    DEG(6,199,4) = 0
-    DEG(6,199,5) = 0
-    DEG(6,199,6) = 0
-    DEG(6,199,7) = 0
-    DEG(6,199,8) = 0
-    DEG(6,199,9) = 1
-    DEG(6,199,10) = 0
-    DEG(6,199,11) = 0
-    DEG(6,199,12) = 1
-  COEF(6,199) = (2.7100698454638046, 0)
-    DEG(6,200,1) = 0
-    DEG(6,200,2) = 0
-    DEG(6,200,3) = 1
-    DEG(6,200,4) = 1
-    DEG(6,200,5) = 0
-    DEG(6,200,6) = 0
-    DEG(6,200,7) = 0
-    DEG(6,200,8) = 0
-    DEG(6,200,9) = 1
-    DEG(6,200,10) = 0
-    DEG(6,200,11) = 0
-    DEG(6,200,12) = 1
-  COEF(6,200) = (0.31414170667924596, 0)
-    DEG(6,201,1) = 0
-    DEG(6,201,2) = 0
-    DEG(6,201,3) = 1
-    DEG(6,201,4) = 0
-    DEG(6,201,5) = 1
-    DEG(6,201,6) = 0
-    DEG(6,201,7) = 0
-    DEG(6,201,8) = 0
-    DEG(6,201,9) = 1
-    DEG(6,201,10) = 0
-    DEG(6,201,11) = 0
-    DEG(6,201,12) = 1
-  COEF(6,201) = (-1.9485294423729955, 0)
-    DEG(6,202,1) = 0
-    DEG(6,202,2) = 0
-    DEG(6,202,3) = 1
-    DEG(6,202,4) = 0
-    DEG(6,202,5) = 0
-    DEG(6,202,6) = 1
-    DEG(6,202,7) = 0
-    DEG(6,202,8) = 0
-    DEG(6,202,9) = 1
-    DEG(6,202,10) = 0
-    DEG(6,202,11) = 0
-    DEG(6,202,12) = 1
-  COEF(6,202) = (-2.7100698454638046, 0)
-
-NUM_TERMS(7) = 202
-    DEG(7,1,1) = 0
-    DEG(7,1,2) = 0
-    DEG(7,1,3) = 0
-    DEG(7,1,4) = 0
-    DEG(7,1,5) = 0
-    DEG(7,1,6) = 0
-    DEG(7,1,7) = 0
-    DEG(7,1,8) = 0
-    DEG(7,1,9) = 0
-    DEG(7,1,10) = 0
-    DEG(7,1,11) = 0
-    DEG(7,1,12) = 0
-  COEF(7,1) = (0.33854781056046446, 0)
-    DEG(7,2,1) = 1
-    DEG(7,2,2) = 0
-    DEG(7,2,3) = 0
-    DEG(7,2,4) = 1
-    DEG(7,2,5) = 0
-    DEG(7,2,6) = 0
-    DEG(7,2,7) = 0
-    DEG(7,2,8) = 0
-    DEG(7,2,9) = 0
-    DEG(7,2,10) = 0
-    DEG(7,2,11) = 0
-    DEG(7,2,12) = 0
-  COEF(7,2) = (1.3497788814396372, 0)
-    DEG(7,3,1) = 0
-    DEG(7,3,2) = 1
-    DEG(7,3,3) = 0
-    DEG(7,3,4) = 1
-    DEG(7,3,5) = 0
-    DEG(7,3,6) = 0
-    DEG(7,3,7) = 0
-    DEG(7,3,8) = 0
-    DEG(7,3,9) = 0
-    DEG(7,3,10) = 0
-    DEG(7,3,11) = 0
-    DEG(7,3,12) = 0
-  COEF(7,3) = (0.5730559468090914, 0)
-    DEG(7,4,1) = 0
-    DEG(7,4,2) = 0
-    DEG(7,4,3) = 1
-    DEG(7,4,4) = 1
-    DEG(7,4,5) = 0
-    DEG(7,4,6) = 0
-    DEG(7,4,7) = 0
-    DEG(7,4,8) = 0
-    DEG(7,4,9) = 0
-    DEG(7,4,10) = 0
-    DEG(7,4,11) = 0
-    DEG(7,4,12) = 0
-  COEF(7,4) = (-1.1315519315269864, 0)
-    DEG(7,5,1) = 0
-    DEG(7,5,2) = 0
-    DEG(7,5,3) = 0
-    DEG(7,5,4) = 2
-    DEG(7,5,5) = 0
-    DEG(7,5,6) = 0
-    DEG(7,5,7) = 0
-    DEG(7,5,8) = 0
-    DEG(7,5,9) = 0
-    DEG(7,5,10) = 0
-    DEG(7,5,11) = 0
-    DEG(7,5,12) = 0
-  COEF(7,5) = (-0.6748894407198186, 0)
-    DEG(7,6,1) = 1
-    DEG(7,6,2) = 0
-    DEG(7,6,3) = 0
-    DEG(7,6,4) = 0
-    DEG(7,6,5) = 1
-    DEG(7,6,6) = 0
-    DEG(7,6,7) = 0
-    DEG(7,6,8) = 0
-    DEG(7,6,9) = 0
-    DEG(7,6,10) = 0
-    DEG(7,6,11) = 0
-    DEG(7,6,12) = 0
-  COEF(7,6) = (0.5730559468090914, 0)
-    DEG(7,7,1) = 0
-    DEG(7,7,2) = 1
-    DEG(7,7,3) = 0
-    DEG(7,7,4) = 0
-    DEG(7,7,5) = 1
-    DEG(7,7,6) = 0
-    DEG(7,7,7) = 0
-    DEG(7,7,8) = 0
-    DEG(7,7,9) = 0
-    DEG(7,7,10) = 0
-    DEG(7,7,11) = 0
-    DEG(7,7,12) = 0
-  COEF(7,7) = (-0.6845997126500983, 0)
-    DEG(7,8,1) = 0
-    DEG(7,8,2) = 0
-    DEG(7,8,3) = 1
-    DEG(7,8,4) = 0
-    DEG(7,8,5) = 1
-    DEG(7,8,6) = 0
-    DEG(7,8,7) = 0
-    DEG(7,8,8) = 0
-    DEG(7,8,9) = 0
-    DEG(7,8,10) = 0
-    DEG(7,8,11) = 0
-    DEG(7,8,12) = 0
-  COEF(7,8) = (0.9775697877313764, 0)
-    DEG(7,9,1) = 0
-    DEG(7,9,2) = 0
-    DEG(7,9,3) = 0
-    DEG(7,9,4) = 1
-    DEG(7,9,5) = 1
-    DEG(7,9,6) = 0
-    DEG(7,9,7) = 0
-    DEG(7,9,8) = 0
-    DEG(7,9,9) = 0
-    DEG(7,9,10) = 0
-    DEG(7,9,11) = 0
-    DEG(7,9,12) = 0
-  COEF(7,9) = (-0.5730559468090914, 0)
-    DEG(7,10,1) = 0
-    DEG(7,10,2) = 0
-    DEG(7,10,3) = 0
-    DEG(7,10,4) = 0
-    DEG(7,10,5) = 2
-    DEG(7,10,6) = 0
-    DEG(7,10,7) = 0
-    DEG(7,10,8) = 0
-    DEG(7,10,9) = 0
-    DEG(7,10,10) = 0
-    DEG(7,10,11) = 0
-    DEG(7,10,12) = 0
-  COEF(7,10) = (0.34229985632504917, 0)
-    DEG(7,11,1) = 1
-    DEG(7,11,2) = 0
-    DEG(7,11,3) = 0
-    DEG(7,11,4) = 0
-    DEG(7,11,5) = 0
-    DEG(7,11,6) = 1
-    DEG(7,11,7) = 0
-    DEG(7,11,8) = 0
-    DEG(7,11,9) = 0
-    DEG(7,11,10) = 0
-    DEG(7,11,11) = 0
-    DEG(7,11,12) = 0
-  COEF(7,11) = (-1.1315519315269864, 0)
-    DEG(7,12,1) = 0
-    DEG(7,12,2) = 1
-    DEG(7,12,3) = 0
-    DEG(7,12,4) = 0
-    DEG(7,12,5) = 0
-    DEG(7,12,6) = 1
-    DEG(7,12,7) = 0
-    DEG(7,12,8) = 0
-    DEG(7,12,9) = 0
-    DEG(7,12,10) = 0
-    DEG(7,12,11) = 0
-    DEG(7,12,12) = 0
-  COEF(7,12) = (0.9775697877313764, 0)
-    DEG(7,13,1) = 0
-    DEG(7,13,2) = 0
-    DEG(7,13,3) = 1
-    DEG(7,13,4) = 0
-    DEG(7,13,5) = 0
-    DEG(7,13,6) = 1
-    DEG(7,13,7) = 0
-    DEG(7,13,8) = 0
-    DEG(7,13,9) = 0
-    DEG(7,13,10) = 0
-    DEG(7,13,11) = 0
-    DEG(7,13,12) = 0
-  COEF(7,13) = (-1.3422747899104677, 0)
-    DEG(7,14,1) = 0
-    DEG(7,14,2) = 0
-    DEG(7,14,3) = 0
-    DEG(7,14,4) = 1
-    DEG(7,14,5) = 0
-    DEG(7,14,6) = 1
-    DEG(7,14,7) = 0
-    DEG(7,14,8) = 0
-    DEG(7,14,9) = 0
-    DEG(7,14,10) = 0
-    DEG(7,14,11) = 0
-    DEG(7,14,12) = 0
-  COEF(7,14) = (1.1315519315269864, 0)
-    DEG(7,15,1) = 0
-    DEG(7,15,2) = 0
-    DEG(7,15,3) = 0
-    DEG(7,15,4) = 0
-    DEG(7,15,5) = 1
-    DEG(7,15,6) = 1
-    DEG(7,15,7) = 0
-    DEG(7,15,8) = 0
-    DEG(7,15,9) = 0
-    DEG(7,15,10) = 0
-    DEG(7,15,11) = 0
-    DEG(7,15,12) = 0
-  COEF(7,15) = (-0.9775697877313764, 0)
-    DEG(7,16,1) = 0
-    DEG(7,16,2) = 0
-    DEG(7,16,3) = 0
-    DEG(7,16,4) = 0
-    DEG(7,16,5) = 0
-    DEG(7,16,6) = 2
-    DEG(7,16,7) = 0
-    DEG(7,16,8) = 0
-    DEG(7,16,9) = 0
-    DEG(7,16,10) = 0
-    DEG(7,16,11) = 0
-    DEG(7,16,12) = 0
-  COEF(7,16) = (0.6711373949552338, 0)
-    DEG(7,17,1) = 0
-    DEG(7,17,2) = 0
-    DEG(7,17,3) = 0
-    DEG(7,17,4) = 0
-    DEG(7,17,5) = 0
-    DEG(7,17,6) = 0
-    DEG(7,17,7) = 1
-    DEG(7,17,8) = 0
-    DEG(7,17,9) = 0
-    DEG(7,17,10) = 0
-    DEG(7,17,11) = 0
-    DEG(7,17,12) = 0
-  COEF(7,17) = (-0.098491168279522, 0)
-    DEG(7,18,1) = 1
-    DEG(7,18,2) = 0
-    DEG(7,18,3) = 0
-    DEG(7,18,4) = 1
-    DEG(7,18,5) = 0
-    DEG(7,18,6) = 0
-    DEG(7,18,7) = 1
-    DEG(7,18,8) = 0
-    DEG(7,18,9) = 0
-    DEG(7,18,10) = 0
-    DEG(7,18,11) = 0
-    DEG(7,18,12) = 0
-  COEF(7,18) = (3.0722248129516707, 0)
-    DEG(7,19,1) = 0
-    DEG(7,19,2) = 1
-    DEG(7,19,3) = 0
-    DEG(7,19,4) = 1
-    DEG(7,19,5) = 0
-    DEG(7,19,6) = 0
-    DEG(7,19,7) = 1
-    DEG(7,19,8) = 0
-    DEG(7,19,9) = 0
-    DEG(7,19,10) = 0
-    DEG(7,19,11) = 0
-    DEG(7,19,12) = 0
-  COEF(7,19) = (2.172304975241386, 0)
-    DEG(7,20,1) = 0
-    DEG(7,20,2) = 0
-    DEG(7,20,3) = 1
-    DEG(7,20,4) = 1
-    DEG(7,20,5) = 0
-    DEG(7,20,6) = 0
-    DEG(7,20,7) = 1
-    DEG(7,20,8) = 0
-    DEG(7,20,9) = 0
-    DEG(7,20,10) = 0
-    DEG(7,20,11) = 0
-    DEG(7,20,12) = 0
-  COEF(7,20) = (-0.5801505080165287, 0)
-    DEG(7,21,1) = 0
-    DEG(7,21,2) = 0
-    DEG(7,21,3) = 0
-    DEG(7,21,4) = 2
-    DEG(7,21,5) = 0
-    DEG(7,21,6) = 0
-    DEG(7,21,7) = 1
-    DEG(7,21,8) = 0
-    DEG(7,21,9) = 0
-    DEG(7,21,10) = 0
-    DEG(7,21,11) = 0
-    DEG(7,21,12) = 0
-  COEF(7,21) = (-1.5361124064758354, 0)
-    DEG(7,22,1) = 1
-    DEG(7,22,2) = 0
-    DEG(7,22,3) = 0
-    DEG(7,22,4) = 0
-    DEG(7,22,5) = 1
-    DEG(7,22,6) = 0
-    DEG(7,22,7) = 1
-    DEG(7,22,8) = 0
-    DEG(7,22,9) = 0
-    DEG(7,22,10) = 0
-    DEG(7,22,11) = 0
-    DEG(7,22,12) = 0
-  COEF(7,22) = (2.172304975241386, 0)
-    DEG(7,23,1) = 0
-    DEG(7,23,2) = 1
-    DEG(7,23,3) = 0
-    DEG(7,23,4) = 0
-    DEG(7,23,5) = 1
-    DEG(7,23,6) = 0
-    DEG(7,23,7) = 1
-    DEG(7,23,8) = 0
-    DEG(7,23,9) = 0
-    DEG(7,23,10) = 0
-    DEG(7,23,11) = 0
-    DEG(7,23,12) = 0
-  COEF(7,23) = (-2.353095261596141, 0)
-    DEG(7,24,1) = 0
-    DEG(7,24,2) = 0
-    DEG(7,24,3) = 1
-    DEG(7,24,4) = 0
-    DEG(7,24,5) = 1
-    DEG(7,24,6) = 0
-    DEG(7,24,7) = 1
-    DEG(7,24,8) = 0
-    DEG(7,24,9) = 0
-    DEG(7,24,10) = 0
-    DEG(7,24,11) = 0
-    DEG(7,24,12) = 0
-  COEF(7,24) = (1.6774274172087247, 0)
-    DEG(7,25,1) = 0
-    DEG(7,25,2) = 0
-    DEG(7,25,3) = 0
-    DEG(7,25,4) = 1
-    DEG(7,25,5) = 1
-    DEG(7,25,6) = 0
-    DEG(7,25,7) = 1
-    DEG(7,25,8) = 0
-    DEG(7,25,9) = 0
-    DEG(7,25,10) = 0
-    DEG(7,25,11) = 0
-    DEG(7,25,12) = 0
-  COEF(7,25) = (-2.172304975241386, 0)
-    DEG(7,26,1) = 0
-    DEG(7,26,2) = 0
-    DEG(7,26,3) = 0
-    DEG(7,26,4) = 0
-    DEG(7,26,5) = 2
-    DEG(7,26,6) = 0
-    DEG(7,26,7) = 1
-    DEG(7,26,8) = 0
-    DEG(7,26,9) = 0
-    DEG(7,26,10) = 0
-    DEG(7,26,11) = 0
-    DEG(7,26,12) = 0
-  COEF(7,26) = (1.1765476307980705, 0)
-    DEG(7,27,1) = 1
-    DEG(7,27,2) = 0
-    DEG(7,27,3) = 0
-    DEG(7,27,4) = 0
-    DEG(7,27,5) = 0
-    DEG(7,27,6) = 1
-    DEG(7,27,7) = 1
-    DEG(7,27,8) = 0
-    DEG(7,27,9) = 0
-    DEG(7,27,10) = 0
-    DEG(7,27,11) = 0
-    DEG(7,27,12) = 0
-  COEF(7,27) = (-0.5801505080165287, 0)
-    DEG(7,28,1) = 0
-    DEG(7,28,2) = 1
-    DEG(7,28,3) = 0
-    DEG(7,28,4) = 0
-    DEG(7,28,5) = 0
-    DEG(7,28,6) = 1
-    DEG(7,28,7) = 1
-    DEG(7,28,8) = 0
-    DEG(7,28,9) = 0
-    DEG(7,28,10) = 0
-    DEG(7,28,11) = 0
-    DEG(7,28,12) = 0
-  COEF(7,28) = (1.6774274172087247, 0)
-    DEG(7,29,1) = 0
-    DEG(7,29,2) = 0
-    DEG(7,29,3) = 1
-    DEG(7,29,4) = 0
-    DEG(7,29,5) = 0
-    DEG(7,29,6) = 1
-    DEG(7,29,7) = 1
-    DEG(7,29,8) = 0
-    DEG(7,29,9) = 0
-    DEG(7,29,10) = 0
-    DEG(7,29,11) = 0
-    DEG(7,29,12) = 0
-  COEF(7,29) = (-0.5221472147964856, 0)
-    DEG(7,30,1) = 0
-    DEG(7,30,2) = 0
-    DEG(7,30,3) = 0
-    DEG(7,30,4) = 1
-    DEG(7,30,5) = 0
-    DEG(7,30,6) = 1
-    DEG(7,30,7) = 1
-    DEG(7,30,8) = 0
-    DEG(7,30,9) = 0
-    DEG(7,30,10) = 0
-    DEG(7,30,11) = 0
-    DEG(7,30,12) = 0
-  COEF(7,30) = (0.5801505080165287, 0)
-    DEG(7,31,1) = 0
-    DEG(7,31,2) = 0
-    DEG(7,31,3) = 0
-    DEG(7,31,4) = 0
-    DEG(7,31,5) = 1
-    DEG(7,31,6) = 1
-    DEG(7,31,7) = 1
-    DEG(7,31,8) = 0
-    DEG(7,31,9) = 0
-    DEG(7,31,10) = 0
-    DEG(7,31,11) = 0
-    DEG(7,31,12) = 0
-  COEF(7,31) = (-1.6774274172087247, 0)
-    DEG(7,32,1) = 0
-    DEG(7,32,2) = 0
-    DEG(7,32,3) = 0
-    DEG(7,32,4) = 0
-    DEG(7,32,5) = 0
-    DEG(7,32,6) = 2
-    DEG(7,32,7) = 1
-    DEG(7,32,8) = 0
-    DEG(7,32,9) = 0
-    DEG(7,32,10) = 0
-    DEG(7,32,11) = 0
-    DEG(7,32,12) = 0
-  COEF(7,32) = (0.2610736073982428, 0)
-    DEG(7,33,1) = 1
-    DEG(7,33,2) = 0
-    DEG(7,33,3) = 0
-    DEG(7,33,4) = 1
-    DEG(7,33,5) = 0
-    DEG(7,33,6) = 0
-    DEG(7,33,7) = 2
-    DEG(7,33,8) = 0
-    DEG(7,33,9) = 0
-    DEG(7,33,10) = 0
-    DEG(7,33,11) = 0
-    DEG(7,33,12) = 0
-  COEF(7,33) = (1.4741241186594847, 0)
-    DEG(7,34,1) = 0
-    DEG(7,34,2) = 1
-    DEG(7,34,3) = 0
-    DEG(7,34,4) = 1
-    DEG(7,34,5) = 0
-    DEG(7,34,6) = 0
-    DEG(7,34,7) = 2
-    DEG(7,34,8) = 0
-    DEG(7,34,9) = 0
-    DEG(7,34,10) = 0
-    DEG(7,34,11) = 0
-    DEG(7,34,12) = 0
-  COEF(7,34) = (1.1973901072831288, 0)
-    DEG(7,35,1) = 0
-    DEG(7,35,2) = 0
-    DEG(7,35,3) = 1
-    DEG(7,35,4) = 1
-    DEG(7,35,5) = 0
-    DEG(7,35,6) = 0
-    DEG(7,35,7) = 2
-    DEG(7,35,8) = 0
-    DEG(7,35,9) = 0
-    DEG(7,35,10) = 0
-    DEG(7,35,11) = 0
-    DEG(7,35,12) = 0
-  COEF(7,35) = (0.018436072041532966, 0)
-    DEG(7,36,1) = 0
-    DEG(7,36,2) = 0
-    DEG(7,36,3) = 0
-    DEG(7,36,4) = 2
-    DEG(7,36,5) = 0
-    DEG(7,36,6) = 0
-    DEG(7,36,7) = 2
-    DEG(7,36,8) = 0
-    DEG(7,36,9) = 0
-    DEG(7,36,10) = 0
-    DEG(7,36,11) = 0
-    DEG(7,36,12) = 0
-  COEF(7,36) = (-0.7370620593297423, 0)
-    DEG(7,37,1) = 1
-    DEG(7,37,2) = 0
-    DEG(7,37,3) = 0
-    DEG(7,37,4) = 0
-    DEG(7,37,5) = 1
-    DEG(7,37,6) = 0
-    DEG(7,37,7) = 2
-    DEG(7,37,8) = 0
-    DEG(7,37,9) = 0
-    DEG(7,37,10) = 0
-    DEG(7,37,11) = 0
-    DEG(7,37,12) = 0
-  COEF(7,37) = (1.1973901072831288, 0)
-    DEG(7,38,1) = 0
-    DEG(7,38,2) = 1
-    DEG(7,38,3) = 0
-    DEG(7,38,4) = 0
-    DEG(7,38,5) = 1
-    DEG(7,38,6) = 0
-    DEG(7,38,7) = 2
-    DEG(7,38,8) = 0
-    DEG(7,38,9) = 0
-    DEG(7,38,10) = 0
-    DEG(7,38,11) = 0
-    DEG(7,38,12) = 0
-  COEF(7,38) = (-1.4312981120281685, 0)
-    DEG(7,39,1) = 0
-    DEG(7,39,2) = 0
-    DEG(7,39,3) = 1
-    DEG(7,39,4) = 0
-    DEG(7,39,5) = 1
-    DEG(7,39,6) = 0
-    DEG(7,39,7) = 2
-    DEG(7,39,8) = 0
-    DEG(7,39,9) = 0
-    DEG(7,39,10) = 0
-    DEG(7,39,11) = 0
-    DEG(7,39,12) = 0
-  COEF(7,39) = (0.3366953512295663, 0)
-    DEG(7,40,1) = 0
-    DEG(7,40,2) = 0
-    DEG(7,40,3) = 0
-    DEG(7,40,4) = 1
-    DEG(7,40,5) = 1
-    DEG(7,40,6) = 0
-    DEG(7,40,7) = 2
-    DEG(7,40,8) = 0
-    DEG(7,40,9) = 0
-    DEG(7,40,10) = 0
-    DEG(7,40,11) = 0
-    DEG(7,40,12) = 0
-  COEF(7,40) = (-1.1973901072831288, 0)
-    DEG(7,41,1) = 0
-    DEG(7,41,2) = 0
-    DEG(7,41,3) = 0
-    DEG(7,41,4) = 0
-    DEG(7,41,5) = 2
-    DEG(7,41,6) = 0
-    DEG(7,41,7) = 2
-    DEG(7,41,8) = 0
-    DEG(7,41,9) = 0
-    DEG(7,41,10) = 0
-    DEG(7,41,11) = 0
-    DEG(7,41,12) = 0
-  COEF(7,41) = (0.7156490560140842, 0)
-    DEG(7,42,1) = 1
-    DEG(7,42,2) = 0
-    DEG(7,42,3) = 0
-    DEG(7,42,4) = 0
-    DEG(7,42,5) = 0
-    DEG(7,42,6) = 1
-    DEG(7,42,7) = 2
-    DEG(7,42,8) = 0
-    DEG(7,42,9) = 0
-    DEG(7,42,10) = 0
-    DEG(7,42,11) = 0
-    DEG(7,42,12) = 0
-  COEF(7,42) = (0.018436072041532966, 0)
-    DEG(7,43,1) = 0
-    DEG(7,43,2) = 1
-    DEG(7,43,3) = 0
-    DEG(7,43,4) = 0
-    DEG(7,43,5) = 0
-    DEG(7,43,6) = 1
-    DEG(7,43,7) = 2
-    DEG(7,43,8) = 0
-    DEG(7,43,9) = 0
-    DEG(7,43,10) = 0
-    DEG(7,43,11) = 0
-    DEG(7,43,12) = 0
-  COEF(7,43) = (0.3366953512295663, 0)
-    DEG(7,44,1) = 0
-    DEG(7,44,2) = 0
-    DEG(7,44,3) = 1
-    DEG(7,44,4) = 0
-    DEG(7,44,5) = 0
-    DEG(7,44,6) = 1
-    DEG(7,44,7) = 2
-    DEG(7,44,8) = 0
-    DEG(7,44,9) = 0
-    DEG(7,44,10) = 0
-    DEG(7,44,11) = 0
-    DEG(7,44,12) = 0
-  COEF(7,44) = (-0.04282600663131627, 0)
-    DEG(7,45,1) = 0
-    DEG(7,45,2) = 0
-    DEG(7,45,3) = 0
-    DEG(7,45,4) = 1
-    DEG(7,45,5) = 0
-    DEG(7,45,6) = 1
-    DEG(7,45,7) = 2
-    DEG(7,45,8) = 0
-    DEG(7,45,9) = 0
-    DEG(7,45,10) = 0
-    DEG(7,45,11) = 0
-    DEG(7,45,12) = 0
-  COEF(7,45) = (-0.018436072041532966, 0)
-    DEG(7,46,1) = 0
-    DEG(7,46,2) = 0
-    DEG(7,46,3) = 0
-    DEG(7,46,4) = 0
-    DEG(7,46,5) = 1
-    DEG(7,46,6) = 1
-    DEG(7,46,7) = 2
-    DEG(7,46,8) = 0
-    DEG(7,46,9) = 0
-    DEG(7,46,10) = 0
-    DEG(7,46,11) = 0
-    DEG(7,46,12) = 0
-  COEF(7,46) = (-0.3366953512295663, 0)
-    DEG(7,47,1) = 0
-    DEG(7,47,2) = 0
-    DEG(7,47,3) = 0
-    DEG(7,47,4) = 0
-    DEG(7,47,5) = 0
-    DEG(7,47,6) = 2
-    DEG(7,47,7) = 2
-    DEG(7,47,8) = 0
-    DEG(7,47,9) = 0
-    DEG(7,47,10) = 0
-    DEG(7,47,11) = 0
-    DEG(7,47,12) = 0
-  COEF(7,47) = (0.021413003315658135, 0)
-    DEG(7,48,1) = 0
-    DEG(7,48,2) = 0
-    DEG(7,48,3) = 0
-    DEG(7,48,4) = 0
-    DEG(7,48,5) = 0
-    DEG(7,48,6) = 0
-    DEG(7,48,7) = 0
-    DEG(7,48,8) = 1
-    DEG(7,48,9) = 0
-    DEG(7,48,10) = 0
-    DEG(7,48,11) = 0
-    DEG(7,48,12) = 0
-  COEF(7,48) = (0.9284781089325803, 0)
-    DEG(7,49,1) = 1
-    DEG(7,49,2) = 0
-    DEG(7,49,3) = 0
-    DEG(7,49,4) = 1
-    DEG(7,49,5) = 0
-    DEG(7,49,6) = 0
-    DEG(7,49,7) = 0
-    DEG(7,49,8) = 1
-    DEG(7,49,9) = 0
-    DEG(7,49,10) = 0
-    DEG(7,49,11) = 0
-    DEG(7,49,12) = 0
-  COEF(7,49) = (1.3803658438346984, 0)
-    DEG(7,50,1) = 0
-    DEG(7,50,2) = 1
-    DEG(7,50,3) = 0
-    DEG(7,50,4) = 1
-    DEG(7,50,5) = 0
-    DEG(7,50,6) = 0
-    DEG(7,50,7) = 0
-    DEG(7,50,8) = 1
-    DEG(7,50,9) = 0
-    DEG(7,50,10) = 0
-    DEG(7,50,11) = 0
-    DEG(7,50,12) = 0
-  COEF(7,50) = (-1.2554534686194507, 0)
-    DEG(7,51,1) = 0
-    DEG(7,51,2) = 0
-    DEG(7,51,3) = 1
-    DEG(7,51,4) = 1
-    DEG(7,51,5) = 0
-    DEG(7,51,6) = 0
-    DEG(7,51,7) = 0
-    DEG(7,51,8) = 1
-    DEG(7,51,9) = 0
-    DEG(7,51,10) = 0
-    DEG(7,51,11) = 0
-    DEG(7,51,12) = 0
-  COEF(7,51) = (1.2608833888835602, 0)
-    DEG(7,52,1) = 0
-    DEG(7,52,2) = 0
-    DEG(7,52,3) = 0
-    DEG(7,52,4) = 2
-    DEG(7,52,5) = 0
-    DEG(7,52,6) = 0
-    DEG(7,52,7) = 0
-    DEG(7,52,8) = 1
-    DEG(7,52,9) = 0
-    DEG(7,52,10) = 0
-    DEG(7,52,11) = 0
-    DEG(7,52,12) = 0
-  COEF(7,52) = (-0.6901829219173492, 0)
-    DEG(7,53,1) = 1
-    DEG(7,53,2) = 0
-    DEG(7,53,3) = 0
-    DEG(7,53,4) = 0
-    DEG(7,53,5) = 1
-    DEG(7,53,6) = 0
-    DEG(7,53,7) = 0
-    DEG(7,53,8) = 1
-    DEG(7,53,9) = 0
-    DEG(7,53,10) = 0
-    DEG(7,53,11) = 0
-    DEG(7,53,12) = 0
-  COEF(7,53) = (-1.2554534686194507, 0)
-    DEG(7,54,1) = 0
-    DEG(7,54,2) = 1
-    DEG(7,54,3) = 0
-    DEG(7,54,4) = 0
-    DEG(7,54,5) = 1
-    DEG(7,54,6) = 0
-    DEG(7,54,7) = 0
-    DEG(7,54,8) = 1
-    DEG(7,54,9) = 0
-    DEG(7,54,10) = 0
-    DEG(7,54,11) = 0
-    DEG(7,54,12) = 0
-  COEF(7,54) = (0.26118202459654216, 0)
-    DEG(7,55,1) = 0
-    DEG(7,55,2) = 0
-    DEG(7,55,3) = 1
-    DEG(7,55,4) = 0
-    DEG(7,55,5) = 1
-    DEG(7,55,6) = 0
-    DEG(7,55,7) = 0
-    DEG(7,55,8) = 1
-    DEG(7,55,9) = 0
-    DEG(7,55,10) = 0
-    DEG(7,55,11) = 0
-    DEG(7,55,12) = 0
-  COEF(7,55) = (0.9727624867611754, 0)
-    DEG(7,56,1) = 0
-    DEG(7,56,2) = 0
-    DEG(7,56,3) = 0
-    DEG(7,56,4) = 1
-    DEG(7,56,5) = 1
-    DEG(7,56,6) = 0
-    DEG(7,56,7) = 0
-    DEG(7,56,8) = 1
-    DEG(7,56,9) = 0
-    DEG(7,56,10) = 0
-    DEG(7,56,11) = 0
-    DEG(7,56,12) = 0
-  COEF(7,56) = (1.2554534686194507, 0)
-    DEG(7,57,1) = 0
-    DEG(7,57,2) = 0
-    DEG(7,57,3) = 0
-    DEG(7,57,4) = 0
-    DEG(7,57,5) = 2
-    DEG(7,57,6) = 0
-    DEG(7,57,7) = 0
-    DEG(7,57,8) = 1
-    DEG(7,57,9) = 0
-    DEG(7,57,10) = 0
-    DEG(7,57,11) = 0
-    DEG(7,57,12) = 0
-  COEF(7,57) = (-0.13059101229827108, 0)
-    DEG(7,58,1) = 1
-    DEG(7,58,2) = 0
-    DEG(7,58,3) = 0
-    DEG(7,58,4) = 0
-    DEG(7,58,5) = 0
-    DEG(7,58,6) = 1
-    DEG(7,58,7) = 0
-    DEG(7,58,8) = 1
-    DEG(7,58,9) = 0
-    DEG(7,58,10) = 0
-    DEG(7,58,11) = 0
-    DEG(7,58,12) = 0
-  COEF(7,58) = (1.2608833888835602, 0)
-    DEG(7,59,1) = 0
-    DEG(7,59,2) = 1
-    DEG(7,59,3) = 0
-    DEG(7,59,4) = 0
-    DEG(7,59,5) = 0
-    DEG(7,59,6) = 1
-    DEG(7,59,7) = 0
-    DEG(7,59,8) = 1
-    DEG(7,59,9) = 0
-    DEG(7,59,10) = 0
-    DEG(7,59,11) = 0
-    DEG(7,59,12) = 0
-  COEF(7,59) = (0.9727624867611754, 0)
-    DEG(7,60,1) = 0
-    DEG(7,60,2) = 0
-    DEG(7,60,3) = 1
-    DEG(7,60,4) = 0
-    DEG(7,60,5) = 0
-    DEG(7,60,6) = 1
-    DEG(7,60,7) = 0
-    DEG(7,60,8) = 1
-    DEG(7,60,9) = 0
-    DEG(7,60,10) = 0
-    DEG(7,60,11) = 0
-    DEG(7,60,12) = 0
-  COEF(7,60) = (-3.498504086296401, 0)
-    DEG(7,61,1) = 0
-    DEG(7,61,2) = 0
-    DEG(7,61,3) = 0
-    DEG(7,61,4) = 1
-    DEG(7,61,5) = 0
-    DEG(7,61,6) = 1
-    DEG(7,61,7) = 0
-    DEG(7,61,8) = 1
-    DEG(7,61,9) = 0
-    DEG(7,61,10) = 0
-    DEG(7,61,11) = 0
-    DEG(7,61,12) = 0
-  COEF(7,61) = (-1.2608833888835602, 0)
-    DEG(7,62,1) = 0
-    DEG(7,62,2) = 0
-    DEG(7,62,3) = 0
-    DEG(7,62,4) = 0
-    DEG(7,62,5) = 1
-    DEG(7,62,6) = 1
-    DEG(7,62,7) = 0
-    DEG(7,62,8) = 1
-    DEG(7,62,9) = 0
-    DEG(7,62,10) = 0
-    DEG(7,62,11) = 0
-    DEG(7,62,12) = 0
-  COEF(7,62) = (-0.9727624867611754, 0)
-    DEG(7,63,1) = 0
-    DEG(7,63,2) = 0
-    DEG(7,63,3) = 0
-    DEG(7,63,4) = 0
-    DEG(7,63,5) = 0
-    DEG(7,63,6) = 2
-    DEG(7,63,7) = 0
-    DEG(7,63,8) = 1
-    DEG(7,63,9) = 0
-    DEG(7,63,10) = 0
-    DEG(7,63,11) = 0
-    DEG(7,63,12) = 0
-  COEF(7,63) = (1.7492520431482006, 0)
-    DEG(7,64,1) = 1
-    DEG(7,64,2) = 0
-    DEG(7,64,3) = 0
-    DEG(7,64,4) = 1
-    DEG(7,64,5) = 0
-    DEG(7,64,6) = 0
-    DEG(7,64,7) = 1
-    DEG(7,64,8) = 1
-    DEG(7,64,9) = 0
-    DEG(7,64,10) = 0
-    DEG(7,64,11) = 0
-    DEG(7,64,12) = 0
-  COEF(7,64) = (0.8208341363849747, 0)
-    DEG(7,65,1) = 0
-    DEG(7,65,2) = 1
-    DEG(7,65,3) = 0
-    DEG(7,65,4) = 1
-    DEG(7,65,5) = 0
-    DEG(7,65,6) = 0
-    DEG(7,65,7) = 1
-    DEG(7,65,8) = 1
-    DEG(7,65,9) = 0
-    DEG(7,65,10) = 0
-    DEG(7,65,11) = 0
-    DEG(7,65,12) = 0
-  COEF(7,65) = (-1.1869727180125111, 0)
-    DEG(7,66,1) = 0
-    DEG(7,66,2) = 0
-    DEG(7,66,3) = 1
-    DEG(7,66,4) = 1
-    DEG(7,66,5) = 0
-    DEG(7,66,6) = 0
-    DEG(7,66,7) = 1
-    DEG(7,66,8) = 1
-    DEG(7,66,9) = 0
-    DEG(7,66,10) = 0
-    DEG(7,66,11) = 0
-    DEG(7,66,12) = 0
-  COEF(7,66) = (1.3592991718960565, 0)
-    DEG(7,67,1) = 0
-    DEG(7,67,2) = 0
-    DEG(7,67,3) = 0
-    DEG(7,67,4) = 2
-    DEG(7,67,5) = 0
-    DEG(7,67,6) = 0
-    DEG(7,67,7) = 1
-    DEG(7,67,8) = 1
-    DEG(7,67,9) = 0
-    DEG(7,67,10) = 0
-    DEG(7,67,11) = 0
-    DEG(7,67,12) = 0
-  COEF(7,67) = (-0.41041706819248736, 0)
-    DEG(7,68,1) = 1
-    DEG(7,68,2) = 0
-    DEG(7,68,3) = 0
-    DEG(7,68,4) = 0
-    DEG(7,68,5) = 1
-    DEG(7,68,6) = 0
-    DEG(7,68,7) = 1
-    DEG(7,68,8) = 1
-    DEG(7,68,9) = 0
-    DEG(7,68,10) = 0
-    DEG(7,68,11) = 0
-    DEG(7,68,12) = 0
-  COEF(7,68) = (-1.1869727180125111, 0)
-    DEG(7,69,1) = 0
-    DEG(7,69,2) = 1
-    DEG(7,69,3) = 0
-    DEG(7,69,4) = 0
-    DEG(7,69,5) = 1
-    DEG(7,69,6) = 0
-    DEG(7,69,7) = 1
-    DEG(7,69,8) = 1
-    DEG(7,69,9) = 0
-    DEG(7,69,10) = 0
-    DEG(7,69,11) = 0
-    DEG(7,69,12) = 0
-  COEF(7,69) = (-0.40239704895201034, 0)
-    DEG(7,70,1) = 0
-    DEG(7,70,2) = 0
-    DEG(7,70,3) = 1
-    DEG(7,70,4) = 0
-    DEG(7,70,5) = 1
-    DEG(7,70,6) = 0
-    DEG(7,70,7) = 1
-    DEG(7,70,8) = 1
-    DEG(7,70,9) = 0
-    DEG(7,70,10) = 0
-    DEG(7,70,11) = 0
-    DEG(7,70,12) = 0
-  COEF(7,70) = (2.6324238740313803, 0)
-    DEG(7,71,1) = 0
-    DEG(7,71,2) = 0
-    DEG(7,71,3) = 0
-    DEG(7,71,4) = 1
-    DEG(7,71,5) = 1
-    DEG(7,71,6) = 0
-    DEG(7,71,7) = 1
-    DEG(7,71,8) = 1
-    DEG(7,71,9) = 0
-    DEG(7,71,10) = 0
-    DEG(7,71,11) = 0
-    DEG(7,71,12) = 0
-  COEF(7,71) = (1.1869727180125111, 0)
-    DEG(7,72,1) = 0
-    DEG(7,72,2) = 0
-    DEG(7,72,3) = 0
-    DEG(7,72,4) = 0
-    DEG(7,72,5) = 2
-    DEG(7,72,6) = 0
-    DEG(7,72,7) = 1
-    DEG(7,72,8) = 1
-    DEG(7,72,9) = 0
-    DEG(7,72,10) = 0
-    DEG(7,72,11) = 0
-    DEG(7,72,12) = 0
-  COEF(7,72) = (0.20119852447600517, 0)
-    DEG(7,73,1) = 1
-    DEG(7,73,2) = 0
-    DEG(7,73,3) = 0
-    DEG(7,73,4) = 0
-    DEG(7,73,5) = 0
-    DEG(7,73,6) = 1
-    DEG(7,73,7) = 1
-    DEG(7,73,8) = 1
-    DEG(7,73,9) = 0
-    DEG(7,73,10) = 0
-    DEG(7,73,11) = 0
-    DEG(7,73,12) = 0
-  COEF(7,73) = (1.3592991718960565, 0)
-    DEG(7,74,1) = 0
-    DEG(7,74,2) = 1
-    DEG(7,74,3) = 0
-    DEG(7,74,4) = 0
-    DEG(7,74,5) = 0
-    DEG(7,74,6) = 1
-    DEG(7,74,7) = 1
-    DEG(7,74,8) = 1
-    DEG(7,74,9) = 0
-    DEG(7,74,10) = 0
-    DEG(7,74,11) = 0
-    DEG(7,74,12) = 0
-  COEF(7,74) = (2.6324238740313803, 0)
-    DEG(7,75,1) = 0
-    DEG(7,75,2) = 0
-    DEG(7,75,3) = 1
-    DEG(7,75,4) = 0
-    DEG(7,75,5) = 0
-    DEG(7,75,6) = 1
-    DEG(7,75,7) = 1
-    DEG(7,75,8) = 1
-    DEG(7,75,9) = 0
-    DEG(7,75,10) = 0
-    DEG(7,75,11) = 0
-    DEG(7,75,12) = 0
-  COEF(7,75) = (-0.4184370874329643, 0)
-    DEG(7,76,1) = 0
-    DEG(7,76,2) = 0
-    DEG(7,76,3) = 0
-    DEG(7,76,4) = 1
-    DEG(7,76,5) = 0
-    DEG(7,76,6) = 1
-    DEG(7,76,7) = 1
-    DEG(7,76,8) = 1
-    DEG(7,76,9) = 0
-    DEG(7,76,10) = 0
-    DEG(7,76,11) = 0
-    DEG(7,76,12) = 0
-  COEF(7,76) = (-1.3592991718960565, 0)
-    DEG(7,77,1) = 0
-    DEG(7,77,2) = 0
-    DEG(7,77,3) = 0
-    DEG(7,77,4) = 0
-    DEG(7,77,5) = 1
-    DEG(7,77,6) = 1
-    DEG(7,77,7) = 1
-    DEG(7,77,8) = 1
-    DEG(7,77,9) = 0
-    DEG(7,77,10) = 0
-    DEG(7,77,11) = 0
-    DEG(7,77,12) = 0
-  COEF(7,77) = (-2.6324238740313803, 0)
-    DEG(7,78,1) = 0
-    DEG(7,78,2) = 0
-    DEG(7,78,3) = 0
-    DEG(7,78,4) = 0
-    DEG(7,78,5) = 0
-    DEG(7,78,6) = 2
-    DEG(7,78,7) = 1
-    DEG(7,78,8) = 1
-    DEG(7,78,9) = 0
-    DEG(7,78,10) = 0
-    DEG(7,78,11) = 0
-    DEG(7,78,12) = 0
-  COEF(7,78) = (0.20921854371648216, 0)
-    DEG(7,79,1) = 1
-    DEG(7,79,2) = 0
-    DEG(7,79,3) = 0
-    DEG(7,79,4) = 1
-    DEG(7,79,5) = 0
-    DEG(7,79,6) = 0
-    DEG(7,79,7) = 0
-    DEG(7,79,8) = 2
-    DEG(7,79,9) = 0
-    DEG(7,79,10) = 0
-    DEG(7,79,11) = 0
-    DEG(7,79,12) = 0
-  COEF(7,79) = (-0.16035476222710776, 0)
-    DEG(7,80,1) = 0
-    DEG(7,80,2) = 1
-    DEG(7,80,3) = 0
-    DEG(7,80,4) = 1
-    DEG(7,80,5) = 0
-    DEG(7,80,6) = 0
-    DEG(7,80,7) = 0
-    DEG(7,80,8) = 2
-    DEG(7,80,9) = 0
-    DEG(7,80,10) = 0
-    DEG(7,80,11) = 0
-    DEG(7,80,12) = 0
-  COEF(7,80) = (-0.07074426056266832, 0)
-    DEG(7,81,1) = 0
-    DEG(7,81,2) = 0
-    DEG(7,81,3) = 1
-    DEG(7,81,4) = 1
-    DEG(7,81,5) = 0
-    DEG(7,81,6) = 0
-    DEG(7,81,7) = 0
-    DEG(7,81,8) = 2
-    DEG(7,81,9) = 0
-    DEG(7,81,10) = 0
-    DEG(7,81,11) = 0
-    DEG(7,81,12) = 0
-  COEF(7,81) = (0.914462240823728, 0)
-    DEG(7,82,1) = 0
-    DEG(7,82,2) = 0
-    DEG(7,82,3) = 0
-    DEG(7,82,4) = 2
-    DEG(7,82,5) = 0
-    DEG(7,82,6) = 0
-    DEG(7,82,7) = 0
-    DEG(7,82,8) = 2
-    DEG(7,82,9) = 0
-    DEG(7,82,10) = 0
-    DEG(7,82,11) = 0
-    DEG(7,82,12) = 0
-  COEF(7,82) = (0.08017738111355388, 0)
-    DEG(7,83,1) = 1
-    DEG(7,83,2) = 0
-    DEG(7,83,3) = 0
-    DEG(7,83,4) = 0
-    DEG(7,83,5) = 1
-    DEG(7,83,6) = 0
-    DEG(7,83,7) = 0
-    DEG(7,83,8) = 2
-    DEG(7,83,9) = 0
-    DEG(7,83,10) = 0
-    DEG(7,83,11) = 0
-    DEG(7,83,12) = 0
-  COEF(7,83) = (-0.07074426056266832, 0)
-    DEG(7,84,1) = 0
-    DEG(7,84,2) = 1
-    DEG(7,84,3) = 0
-    DEG(7,84,4) = 0
-    DEG(7,84,5) = 1
-    DEG(7,84,6) = 0
-    DEG(7,84,7) = 0
-    DEG(7,84,8) = 2
-    DEG(7,84,9) = 0
-    DEG(7,84,10) = 0
-    DEG(7,84,11) = 0
-    DEG(7,84,12) = 0
-  COEF(7,84) = (0.2817755129221239, 0)
-    DEG(7,85,1) = 0
-    DEG(7,85,2) = 0
-    DEG(7,85,3) = 1
-    DEG(7,85,4) = 0
-    DEG(7,85,5) = 1
-    DEG(7,85,6) = 0
-    DEG(7,85,7) = 0
-    DEG(7,85,8) = 2
-    DEG(7,85,9) = 0
-    DEG(7,85,10) = 0
-    DEG(7,85,11) = 0
-    DEG(7,85,12) = 0
-  COEF(7,85) = (-0.8591805361816931, 0)
-    DEG(7,86,1) = 0
-    DEG(7,86,2) = 0
-    DEG(7,86,3) = 0
-    DEG(7,86,4) = 1
-    DEG(7,86,5) = 1
-    DEG(7,86,6) = 0
-    DEG(7,86,7) = 0
-    DEG(7,86,8) = 2
-    DEG(7,86,9) = 0
-    DEG(7,86,10) = 0
-    DEG(7,86,11) = 0
-    DEG(7,86,12) = 0
-  COEF(7,86) = (0.07074426056266832, 0)
-    DEG(7,87,1) = 0
-    DEG(7,87,2) = 0
-    DEG(7,87,3) = 0
-    DEG(7,87,4) = 0
-    DEG(7,87,5) = 2
-    DEG(7,87,6) = 0
-    DEG(7,87,7) = 0
-    DEG(7,87,8) = 2
-    DEG(7,87,9) = 0
-    DEG(7,87,10) = 0
-    DEG(7,87,11) = 0
-    DEG(7,87,12) = 0
-  COEF(7,87) = (-0.14088775646106194, 0)
-    DEG(7,88,1) = 1
-    DEG(7,88,2) = 0
-    DEG(7,88,3) = 0
-    DEG(7,88,4) = 0
-    DEG(7,88,5) = 0
-    DEG(7,88,6) = 1
-    DEG(7,88,7) = 0
-    DEG(7,88,8) = 2
-    DEG(7,88,9) = 0
-    DEG(7,88,10) = 0
-    DEG(7,88,11) = 0
-    DEG(7,88,12) = 0
-  COEF(7,88) = (0.914462240823728, 0)
-    DEG(7,89,1) = 0
-    DEG(7,89,2) = 1
-    DEG(7,89,3) = 0
-    DEG(7,89,4) = 0
-    DEG(7,89,5) = 0
-    DEG(7,89,6) = 1
-    DEG(7,89,7) = 0
-    DEG(7,89,8) = 2
-    DEG(7,89,9) = 0
-    DEG(7,89,10) = 0
-    DEG(7,89,11) = 0
-    DEG(7,89,12) = 0
-  COEF(7,89) = (-0.8591805361816931, 0)
-    DEG(7,90,1) = 0
-    DEG(7,90,2) = 0
-    DEG(7,90,3) = 1
-    DEG(7,90,4) = 0
-    DEG(7,90,5) = 0
-    DEG(7,90,6) = 1
-    DEG(7,90,7) = 0
-    DEG(7,90,8) = 2
-    DEG(7,90,9) = 0
-    DEG(7,90,10) = 0
-    DEG(7,90,11) = 0
-    DEG(7,90,12) = 0
-  COEF(7,90) = (-0.12142075069501611, 0)
-    DEG(7,91,1) = 0
-    DEG(7,91,2) = 0
-    DEG(7,91,3) = 0
-    DEG(7,91,4) = 1
-    DEG(7,91,5) = 0
-    DEG(7,91,6) = 1
-    DEG(7,91,7) = 0
-    DEG(7,91,8) = 2
-    DEG(7,91,9) = 0
-    DEG(7,91,10) = 0
-    DEG(7,91,11) = 0
-    DEG(7,91,12) = 0
-  COEF(7,91) = (-0.914462240823728, 0)
-    DEG(7,92,1) = 0
-    DEG(7,92,2) = 0
-    DEG(7,92,3) = 0
-    DEG(7,92,4) = 0
-    DEG(7,92,5) = 1
-    DEG(7,92,6) = 1
-    DEG(7,92,7) = 0
-    DEG(7,92,8) = 2
-    DEG(7,92,9) = 0
-    DEG(7,92,10) = 0
-    DEG(7,92,11) = 0
-    DEG(7,92,12) = 0
-  COEF(7,92) = (0.8591805361816931, 0)
-    DEG(7,93,1) = 0
-    DEG(7,93,2) = 0
-    DEG(7,93,3) = 0
-    DEG(7,93,4) = 0
-    DEG(7,93,5) = 0
-    DEG(7,93,6) = 2
-    DEG(7,93,7) = 0
-    DEG(7,93,8) = 2
-    DEG(7,93,9) = 0
-    DEG(7,93,10) = 0
-    DEG(7,93,11) = 0
-    DEG(7,93,12) = 0
-  COEF(7,93) = (0.060710375347508054, 0)
-    DEG(7,94,1) = 0
-    DEG(7,94,2) = 0
-    DEG(7,94,3) = 0
-    DEG(7,94,4) = 0
-    DEG(7,94,5) = 0
-    DEG(7,94,6) = 0
-    DEG(7,94,7) = 0
-    DEG(7,94,8) = 0
-    DEG(7,94,9) = 1
-    DEG(7,94,10) = 0
-    DEG(7,94,11) = 0
-    DEG(7,94,12) = 0
-  COEF(7,94) = (0.22296974826408356, 0)
-    DEG(7,95,1) = 1
-    DEG(7,95,2) = 0
-    DEG(7,95,3) = 0
-    DEG(7,95,4) = 1
-    DEG(7,95,5) = 0
-    DEG(7,95,6) = 0
-    DEG(7,95,7) = 0
-    DEG(7,95,8) = 0
-    DEG(7,95,9) = 1
-    DEG(7,95,10) = 0
-    DEG(7,95,11) = 0
-    DEG(7,95,12) = 0
-  COEF(7,95) = (-0.28094229215052524, 0)
-    DEG(7,96,1) = 0
-    DEG(7,96,2) = 1
-    DEG(7,96,3) = 0
-    DEG(7,96,4) = 1
-    DEG(7,96,5) = 0
-    DEG(7,96,6) = 0
-    DEG(7,96,7) = 0
-    DEG(7,96,8) = 0
-    DEG(7,96,9) = 1
-    DEG(7,96,10) = 0
-    DEG(7,96,11) = 0
-    DEG(7,96,12) = 0
-  COEF(7,96) = (-0.7691393623230398, 0)
-    DEG(7,97,1) = 0
-    DEG(7,97,2) = 0
-    DEG(7,97,3) = 1
-    DEG(7,97,4) = 1
-    DEG(7,97,5) = 0
-    DEG(7,97,6) = 0
-    DEG(7,97,7) = 0
-    DEG(7,97,8) = 0
-    DEG(7,97,9) = 1
-    DEG(7,97,10) = 0
-    DEG(7,97,11) = 0
-    DEG(7,97,12) = 0
-  COEF(7,97) = (-2.788657663942111, 0)
-    DEG(7,98,1) = 0
-    DEG(7,98,2) = 0
-    DEG(7,98,3) = 0
-    DEG(7,98,4) = 2
-    DEG(7,98,5) = 0
-    DEG(7,98,6) = 0
-    DEG(7,98,7) = 0
-    DEG(7,98,8) = 0
-    DEG(7,98,9) = 1
-    DEG(7,98,10) = 0
-    DEG(7,98,11) = 0
-    DEG(7,98,12) = 0
-  COEF(7,98) = (0.14047114607526262, 0)
-    DEG(7,99,1) = 1
-    DEG(7,99,2) = 0
-    DEG(7,99,3) = 0
-    DEG(7,99,4) = 0
-    DEG(7,99,5) = 1
-    DEG(7,99,6) = 0
-    DEG(7,99,7) = 0
-    DEG(7,99,8) = 0
-    DEG(7,99,9) = 1
-    DEG(7,99,10) = 0
-    DEG(7,99,11) = 0
-    DEG(7,99,12) = 0
-  COEF(7,99) = (-0.7691393623230398, 0)
-    DEG(7,100,1) = 0
-    DEG(7,100,2) = 1
-    DEG(7,100,3) = 0
-    DEG(7,100,4) = 0
-    DEG(7,100,5) = 1
-    DEG(7,100,6) = 0
-    DEG(7,100,7) = 0
-    DEG(7,100,8) = 0
-    DEG(7,100,9) = 1
-    DEG(7,100,10) = 0
-    DEG(7,100,11) = 0
-    DEG(7,100,12) = 0
-  COEF(7,100) = (0.654635879537118, 0)
-    DEG(7,101,1) = 0
-    DEG(7,101,2) = 0
-    DEG(7,101,3) = 1
-    DEG(7,101,4) = 0
-    DEG(7,101,5) = 1
-    DEG(7,101,6) = 0
-    DEG(7,101,7) = 0
-    DEG(7,101,8) = 0
-    DEG(7,101,9) = 1
-    DEG(7,101,10) = 0
-    DEG(7,101,11) = 0
-    DEG(7,101,12) = 0
-  COEF(7,101) = (0.18472812846941733, 0)
-    DEG(7,102,1) = 0
-    DEG(7,102,2) = 0
-    DEG(7,102,3) = 0
-    DEG(7,102,4) = 1
-    DEG(7,102,5) = 1
-    DEG(7,102,6) = 0
-    DEG(7,102,7) = 0
-    DEG(7,102,8) = 0
-    DEG(7,102,9) = 1
-    DEG(7,102,10) = 0
-    DEG(7,102,11) = 0
-    DEG(7,102,12) = 0
-  COEF(7,102) = (0.7691393623230398, 0)
-    DEG(7,103,1) = 0
-    DEG(7,103,2) = 0
-    DEG(7,103,3) = 0
-    DEG(7,103,4) = 0
-    DEG(7,103,5) = 2
-    DEG(7,103,6) = 0
-    DEG(7,103,7) = 0
-    DEG(7,103,8) = 0
-    DEG(7,103,9) = 1
-    DEG(7,103,10) = 0
-    DEG(7,103,11) = 0
-    DEG(7,103,12) = 0
-  COEF(7,103) = (-0.327317939768559, 0)
-    DEG(7,104,1) = 1
-    DEG(7,104,2) = 0
-    DEG(7,104,3) = 0
-    DEG(7,104,4) = 0
-    DEG(7,104,5) = 0
-    DEG(7,104,6) = 1
-    DEG(7,104,7) = 0
-    DEG(7,104,8) = 0
-    DEG(7,104,9) = 1
-    DEG(7,104,10) = 0
-    DEG(7,104,11) = 0
-    DEG(7,104,12) = 0
-  COEF(7,104) = (-2.788657663942111, 0)
-    DEG(7,105,1) = 0
-    DEG(7,105,2) = 1
-    DEG(7,105,3) = 0
-    DEG(7,105,4) = 0
-    DEG(7,105,5) = 0
-    DEG(7,105,6) = 1
-    DEG(7,105,7) = 0
-    DEG(7,105,8) = 0
-    DEG(7,105,9) = 1
-    DEG(7,105,10) = 0
-    DEG(7,105,11) = 0
-    DEG(7,105,12) = 0
-  COEF(7,105) = (0.18472812846941733, 0)
-    DEG(7,106,1) = 0
-    DEG(7,106,2) = 0
-    DEG(7,106,3) = 1
-    DEG(7,106,4) = 0
-    DEG(7,106,5) = 0
-    DEG(7,106,6) = 1
-    DEG(7,106,7) = 0
-    DEG(7,106,8) = 0
-    DEG(7,106,9) = 1
-    DEG(7,106,10) = 0
-    DEG(7,106,11) = 0
-    DEG(7,106,12) = 0
-  COEF(7,106) = (-0.81963308391476, 0)
-    DEG(7,107,1) = 0
-    DEG(7,107,2) = 0
-    DEG(7,107,3) = 0
-    DEG(7,107,4) = 1
-    DEG(7,107,5) = 0
-    DEG(7,107,6) = 1
-    DEG(7,107,7) = 0
-    DEG(7,107,8) = 0
-    DEG(7,107,9) = 1
-    DEG(7,107,10) = 0
-    DEG(7,107,11) = 0
-    DEG(7,107,12) = 0
-  COEF(7,107) = (2.788657663942111, 0)
-    DEG(7,108,1) = 0
-    DEG(7,108,2) = 0
-    DEG(7,108,3) = 0
-    DEG(7,108,4) = 0
-    DEG(7,108,5) = 1
-    DEG(7,108,6) = 1
-    DEG(7,108,7) = 0
-    DEG(7,108,8) = 0
-    DEG(7,108,9) = 1
-    DEG(7,108,10) = 0
-    DEG(7,108,11) = 0
-    DEG(7,108,12) = 0
-  COEF(7,108) = (-0.18472812846941733, 0)
-    DEG(7,109,1) = 0
-    DEG(7,109,2) = 0
-    DEG(7,109,3) = 0
-    DEG(7,109,4) = 0
-    DEG(7,109,5) = 0
-    DEG(7,109,6) = 2
-    DEG(7,109,7) = 0
-    DEG(7,109,8) = 0
-    DEG(7,109,9) = 1
-    DEG(7,109,10) = 0
-    DEG(7,109,11) = 0
-    DEG(7,109,12) = 0
-  COEF(7,109) = (0.40981654195738, 0)
-    DEG(7,110,1) = 1
-    DEG(7,110,2) = 0
-    DEG(7,110,3) = 0
-    DEG(7,110,4) = 1
-    DEG(7,110,5) = 0
-    DEG(7,110,6) = 0
-    DEG(7,110,7) = 1
-    DEG(7,110,8) = 0
-    DEG(7,110,9) = 1
-    DEG(7,110,10) = 0
-    DEG(7,110,11) = 0
-    DEG(7,110,12) = 0
-  COEF(7,110) = (0.8869850882196616, 0)
-    DEG(7,111,1) = 0
-    DEG(7,111,2) = 1
-    DEG(7,111,3) = 0
-    DEG(7,111,4) = 1
-    DEG(7,111,5) = 0
-    DEG(7,111,6) = 0
-    DEG(7,111,7) = 1
-    DEG(7,111,8) = 0
-    DEG(7,111,9) = 1
-    DEG(7,111,10) = 0
-    DEG(7,111,11) = 0
-    DEG(7,111,12) = 0
-  COEF(7,111) = (0.7522254427023475, 0)
-    DEG(7,112,1) = 0
-    DEG(7,112,2) = 0
-    DEG(7,112,3) = 1
-    DEG(7,112,4) = 1
-    DEG(7,112,5) = 0
-    DEG(7,112,6) = 0
-    DEG(7,112,7) = 1
-    DEG(7,112,8) = 0
-    DEG(7,112,9) = 1
-    DEG(7,112,10) = 0
-    DEG(7,112,11) = 0
-    DEG(7,112,12) = 0
-  COEF(7,112) = (-1.087779061839024, 0)
-    DEG(7,113,1) = 0
-    DEG(7,113,2) = 0
-    DEG(7,113,3) = 0
-    DEG(7,113,4) = 2
-    DEG(7,113,5) = 0
-    DEG(7,113,6) = 0
-    DEG(7,113,7) = 1
-    DEG(7,113,8) = 0
-    DEG(7,113,9) = 1
-    DEG(7,113,10) = 0
-    DEG(7,113,11) = 0
-    DEG(7,113,12) = 0
-  COEF(7,113) = (-0.4434925441098308, 0)
-    DEG(7,114,1) = 1
-    DEG(7,114,2) = 0
-    DEG(7,114,3) = 0
-    DEG(7,114,4) = 0
-    DEG(7,114,5) = 1
-    DEG(7,114,6) = 0
-    DEG(7,114,7) = 1
-    DEG(7,114,8) = 0
-    DEG(7,114,9) = 1
-    DEG(7,114,10) = 0
-    DEG(7,114,11) = 0
-    DEG(7,114,12) = 0
-  COEF(7,114) = (0.7522254427023475, 0)
-    DEG(7,115,1) = 0
-    DEG(7,115,2) = 1
-    DEG(7,115,3) = 0
-    DEG(7,115,4) = 0
-    DEG(7,115,5) = 1
-    DEG(7,115,6) = 0
-    DEG(7,115,7) = 1
-    DEG(7,115,8) = 0
-    DEG(7,115,9) = 1
-    DEG(7,115,10) = 0
-    DEG(7,115,11) = 0
-    DEG(7,115,12) = 0
-  COEF(7,115) = (-0.6316205744564828, 0)
-    DEG(7,116,1) = 0
-    DEG(7,116,2) = 0
-    DEG(7,116,3) = 1
-    DEG(7,116,4) = 0
-    DEG(7,116,5) = 1
-    DEG(7,116,6) = 0
-    DEG(7,116,7) = 1
-    DEG(7,116,8) = 0
-    DEG(7,116,9) = 1
-    DEG(7,116,10) = 0
-    DEG(7,116,11) = 0
-    DEG(7,116,12) = 0
-  COEF(7,116) = (0.05357886022515003, 0)
-    DEG(7,117,1) = 0
-    DEG(7,117,2) = 0
-    DEG(7,117,3) = 0
-    DEG(7,117,4) = 1
-    DEG(7,117,5) = 1
-    DEG(7,117,6) = 0
-    DEG(7,117,7) = 1
-    DEG(7,117,8) = 0
-    DEG(7,117,9) = 1
-    DEG(7,117,10) = 0
-    DEG(7,117,11) = 0
-    DEG(7,117,12) = 0
-  COEF(7,117) = (-0.7522254427023475, 0)
-    DEG(7,118,1) = 0
-    DEG(7,118,2) = 0
-    DEG(7,118,3) = 0
-    DEG(7,118,4) = 0
-    DEG(7,118,5) = 2
-    DEG(7,118,6) = 0
-    DEG(7,118,7) = 1
-    DEG(7,118,8) = 0
-    DEG(7,118,9) = 1
-    DEG(7,118,10) = 0
-    DEG(7,118,11) = 0
-    DEG(7,118,12) = 0
-  COEF(7,118) = (0.3158102872282414, 0)
-    DEG(7,119,1) = 1
-    DEG(7,119,2) = 0
-    DEG(7,119,3) = 0
-    DEG(7,119,4) = 0
-    DEG(7,119,5) = 0
-    DEG(7,119,6) = 1
-    DEG(7,119,7) = 1
-    DEG(7,119,8) = 0
-    DEG(7,119,9) = 1
-    DEG(7,119,10) = 0
-    DEG(7,119,11) = 0
-    DEG(7,119,12) = 0
-  COEF(7,119) = (-1.087779061839024, 0)
-    DEG(7,120,1) = 0
-    DEG(7,120,2) = 1
-    DEG(7,120,3) = 0
-    DEG(7,120,4) = 0
-    DEG(7,120,5) = 0
-    DEG(7,120,6) = 1
-    DEG(7,120,7) = 1
-    DEG(7,120,8) = 0
-    DEG(7,120,9) = 1
-    DEG(7,120,10) = 0
-    DEG(7,120,11) = 0
-    DEG(7,120,12) = 0
-  COEF(7,120) = (0.05357886022515003, 0)
-    DEG(7,121,1) = 0
-    DEG(7,121,2) = 0
-    DEG(7,121,3) = 1
-    DEG(7,121,4) = 0
-    DEG(7,121,5) = 0
-    DEG(7,121,6) = 1
-    DEG(7,121,7) = 1
-    DEG(7,121,8) = 0
-    DEG(7,121,9) = 1
-    DEG(7,121,10) = 0
-    DEG(7,121,11) = 0
-    DEG(7,121,12) = 0
-  COEF(7,121) = (-0.25536451376317876, 0)
-    DEG(7,122,1) = 0
-    DEG(7,122,2) = 0
-    DEG(7,122,3) = 0
-    DEG(7,122,4) = 1
-    DEG(7,122,5) = 0
-    DEG(7,122,6) = 1
-    DEG(7,122,7) = 1
-    DEG(7,122,8) = 0
-    DEG(7,122,9) = 1
-    DEG(7,122,10) = 0
-    DEG(7,122,11) = 0
-    DEG(7,122,12) = 0
-  COEF(7,122) = (1.087779061839024, 0)
-    DEG(7,123,1) = 0
-    DEG(7,123,2) = 0
-    DEG(7,123,3) = 0
-    DEG(7,123,4) = 0
-    DEG(7,123,5) = 1
-    DEG(7,123,6) = 1
-    DEG(7,123,7) = 1
-    DEG(7,123,8) = 0
-    DEG(7,123,9) = 1
-    DEG(7,123,10) = 0
-    DEG(7,123,11) = 0
-    DEG(7,123,12) = 0
-  COEF(7,123) = (-0.05357886022515003, 0)
-    DEG(7,124,1) = 0
-    DEG(7,124,2) = 0
-    DEG(7,124,3) = 0
-    DEG(7,124,4) = 0
-    DEG(7,124,5) = 0
-    DEG(7,124,6) = 2
-    DEG(7,124,7) = 1
-    DEG(7,124,8) = 0
-    DEG(7,124,9) = 1
-    DEG(7,124,10) = 0
-    DEG(7,124,11) = 0
-    DEG(7,124,12) = 0
-  COEF(7,124) = (0.12768225688158938, 0)
-    DEG(7,125,1) = 1
-    DEG(7,125,2) = 0
-    DEG(7,125,3) = 0
-    DEG(7,125,4) = 1
-    DEG(7,125,5) = 0
-    DEG(7,125,6) = 0
-    DEG(7,125,7) = 0
-    DEG(7,125,8) = 1
-    DEG(7,125,9) = 1
-    DEG(7,125,10) = 0
-    DEG(7,125,11) = 0
-    DEG(7,125,12) = 0
-  COEF(7,125) = (1.5077896488439104, 0)
-    DEG(7,126,1) = 0
-    DEG(7,126,2) = 1
-    DEG(7,126,3) = 0
-    DEG(7,126,4) = 1
-    DEG(7,126,5) = 0
-    DEG(7,126,6) = 0
-    DEG(7,126,7) = 0
-    DEG(7,126,8) = 1
-    DEG(7,126,9) = 1
-    DEG(7,126,10) = 0
-    DEG(7,126,11) = 0
-    DEG(7,126,12) = 0
-  COEF(7,126) = (-0.6153998181117468, 0)
-    DEG(7,127,1) = 0
-    DEG(7,127,2) = 0
-    DEG(7,127,3) = 1
-    DEG(7,127,4) = 1
-    DEG(7,127,5) = 0
-    DEG(7,127,6) = 0
-    DEG(7,127,7) = 0
-    DEG(7,127,8) = 1
-    DEG(7,127,9) = 1
-    DEG(7,127,10) = 0
-    DEG(7,127,11) = 0
-    DEG(7,127,12) = 0
-  COEF(7,127) = (-0.8676521768665081, 0)
-    DEG(7,128,1) = 0
-    DEG(7,128,2) = 0
-    DEG(7,128,3) = 0
-    DEG(7,128,4) = 2
-    DEG(7,128,5) = 0
-    DEG(7,128,6) = 0
-    DEG(7,128,7) = 0
-    DEG(7,128,8) = 1
-    DEG(7,128,9) = 1
-    DEG(7,128,10) = 0
-    DEG(7,128,11) = 0
-    DEG(7,128,12) = 0
-  COEF(7,128) = (-0.7538948244219552, 0)
-    DEG(7,129,1) = 1
-    DEG(7,129,2) = 0
-    DEG(7,129,3) = 0
-    DEG(7,129,4) = 0
-    DEG(7,129,5) = 1
-    DEG(7,129,6) = 0
-    DEG(7,129,7) = 0
-    DEG(7,129,8) = 1
-    DEG(7,129,9) = 1
-    DEG(7,129,10) = 0
-    DEG(7,129,11) = 0
-    DEG(7,129,12) = 0
-  COEF(7,129) = (-0.6153998181117468, 0)
-    DEG(7,130,1) = 0
-    DEG(7,130,2) = 1
-    DEG(7,130,3) = 0
-    DEG(7,130,4) = 0
-    DEG(7,130,5) = 1
-    DEG(7,130,6) = 0
-    DEG(7,130,7) = 0
-    DEG(7,130,8) = 1
-    DEG(7,130,9) = 1
-    DEG(7,130,10) = 0
-    DEG(7,130,11) = 0
-    DEG(7,130,12) = 0
-  COEF(7,130) = (1.1408864239958658, 0)
-    DEG(7,131,1) = 0
-    DEG(7,131,2) = 0
-    DEG(7,131,3) = 1
-    DEG(7,131,4) = 0
-    DEG(7,131,5) = 1
-    DEG(7,131,6) = 0
-    DEG(7,131,7) = 0
-    DEG(7,131,8) = 1
-    DEG(7,131,9) = 1
-    DEG(7,131,10) = 0
-    DEG(7,131,11) = 0
-    DEG(7,131,12) = 0
-  COEF(7,131) = (-1.5910513899808751, 0)
-    DEG(7,132,1) = 0
-    DEG(7,132,2) = 0
-    DEG(7,132,3) = 0
-    DEG(7,132,4) = 1
-    DEG(7,132,5) = 1
-    DEG(7,132,6) = 0
-    DEG(7,132,7) = 0
-    DEG(7,132,8) = 1
-    DEG(7,132,9) = 1
-    DEG(7,132,10) = 0
-    DEG(7,132,11) = 0
-    DEG(7,132,12) = 0
-  COEF(7,132) = (0.6153998181117468, 0)
-    DEG(7,133,1) = 0
-    DEG(7,133,2) = 0
-    DEG(7,133,3) = 0
-    DEG(7,133,4) = 0
-    DEG(7,133,5) = 2
-    DEG(7,133,6) = 0
-    DEG(7,133,7) = 0
-    DEG(7,133,8) = 1
-    DEG(7,133,9) = 1
-    DEG(7,133,10) = 0
-    DEG(7,133,11) = 0
-    DEG(7,133,12) = 0
-  COEF(7,133) = (-0.5704432119979329, 0)
-    DEG(7,134,1) = 1
-    DEG(7,134,2) = 0
-    DEG(7,134,3) = 0
-    DEG(7,134,4) = 0
-    DEG(7,134,5) = 0
-    DEG(7,134,6) = 1
-    DEG(7,134,7) = 0
-    DEG(7,134,8) = 1
-    DEG(7,134,9) = 1
-    DEG(7,134,10) = 0
-    DEG(7,134,11) = 0
-    DEG(7,134,12) = 0
-  COEF(7,134) = (-0.8676521768665081, 0)
-    DEG(7,135,1) = 0
-    DEG(7,135,2) = 1
-    DEG(7,135,3) = 0
-    DEG(7,135,4) = 0
-    DEG(7,135,5) = 0
-    DEG(7,135,6) = 1
-    DEG(7,135,7) = 0
-    DEG(7,135,8) = 1
-    DEG(7,135,9) = 1
-    DEG(7,135,10) = 0
-    DEG(7,135,11) = 0
-    DEG(7,135,12) = 0
-  COEF(7,135) = (-1.5910513899808751, 0)
-    DEG(7,136,1) = 0
-    DEG(7,136,2) = 0
-    DEG(7,136,3) = 1
-    DEG(7,136,4) = 0
-    DEG(7,136,5) = 0
-    DEG(7,136,6) = 1
-    DEG(7,136,7) = 0
-    DEG(7,136,8) = 1
-    DEG(7,136,9) = 1
-    DEG(7,136,10) = 0
-    DEG(7,136,11) = 0
-    DEG(7,136,12) = 0
-  COEF(7,136) = (-2.648676072839776, 0)
-    DEG(7,137,1) = 0
-    DEG(7,137,2) = 0
-    DEG(7,137,3) = 0
-    DEG(7,137,4) = 1
-    DEG(7,137,5) = 0
-    DEG(7,137,6) = 1
-    DEG(7,137,7) = 0
-    DEG(7,137,8) = 1
-    DEG(7,137,9) = 1
-    DEG(7,137,10) = 0
-    DEG(7,137,11) = 0
-    DEG(7,137,12) = 0
-  COEF(7,137) = (0.8676521768665081, 0)
-    DEG(7,138,1) = 0
-    DEG(7,138,2) = 0
-    DEG(7,138,3) = 0
-    DEG(7,138,4) = 0
-    DEG(7,138,5) = 1
-    DEG(7,138,6) = 1
-    DEG(7,138,7) = 0
-    DEG(7,138,8) = 1
-    DEG(7,138,9) = 1
-    DEG(7,138,10) = 0
-    DEG(7,138,11) = 0
-    DEG(7,138,12) = 0
-  COEF(7,138) = (1.5910513899808751, 0)
-    DEG(7,139,1) = 0
-    DEG(7,139,2) = 0
-    DEG(7,139,3) = 0
-    DEG(7,139,4) = 0
-    DEG(7,139,5) = 0
-    DEG(7,139,6) = 2
-    DEG(7,139,7) = 0
-    DEG(7,139,8) = 1
-    DEG(7,139,9) = 1
-    DEG(7,139,10) = 0
-    DEG(7,139,11) = 0
-    DEG(7,139,12) = 0
-  COEF(7,139) = (1.324338036419888, 0)
-    DEG(7,140,1) = 1
-    DEG(7,140,2) = 0
-    DEG(7,140,3) = 0
-    DEG(7,140,4) = 1
-    DEG(7,140,5) = 0
-    DEG(7,140,6) = 0
-    DEG(7,140,7) = 0
-    DEG(7,140,8) = 0
-    DEG(7,140,9) = 2
-    DEG(7,140,10) = 0
-    DEG(7,140,11) = 0
-    DEG(7,140,12) = 0
-  COEF(7,140) = (-1.313769356432377, 0)
-    DEG(7,141,1) = 0
-    DEG(7,141,2) = 1
-    DEG(7,141,3) = 0
-    DEG(7,141,4) = 1
-    DEG(7,141,5) = 0
-    DEG(7,141,6) = 0
-    DEG(7,141,7) = 0
-    DEG(7,141,8) = 0
-    DEG(7,141,9) = 2
-    DEG(7,141,10) = 0
-    DEG(7,141,11) = 0
-    DEG(7,141,12) = 0
-  COEF(7,141) = (-1.1266458467204603, 0)
-    DEG(7,142,1) = 0
-    DEG(7,142,2) = 0
-    DEG(7,142,3) = 1
-    DEG(7,142,4) = 1
-    DEG(7,142,5) = 0
-    DEG(7,142,6) = 0
-    DEG(7,142,7) = 0
-    DEG(7,142,8) = 0
-    DEG(7,142,9) = 2
-    DEG(7,142,10) = 0
-    DEG(7,142,11) = 0
-    DEG(7,142,12) = 0
-  COEF(7,142) = (-0.9328983128652609, 0)
-    DEG(7,143,1) = 0
-    DEG(7,143,2) = 0
-    DEG(7,143,3) = 0
-    DEG(7,143,4) = 2
-    DEG(7,143,5) = 0
-    DEG(7,143,6) = 0
-    DEG(7,143,7) = 0
-    DEG(7,143,8) = 0
-    DEG(7,143,9) = 2
-    DEG(7,143,10) = 0
-    DEG(7,143,11) = 0
-    DEG(7,143,12) = 0
-  COEF(7,143) = (0.6568846782161885, 0)
-    DEG(7,144,1) = 1
-    DEG(7,144,2) = 0
-    DEG(7,144,3) = 0
-    DEG(7,144,4) = 0
-    DEG(7,144,5) = 1
-    DEG(7,144,6) = 0
-    DEG(7,144,7) = 0
-    DEG(7,144,8) = 0
-    DEG(7,144,9) = 2
-    DEG(7,144,10) = 0
-    DEG(7,144,11) = 0
-    DEG(7,144,12) = 0
-  COEF(7,144) = (-1.1266458467204603, 0)
-    DEG(7,145,1) = 0
-    DEG(7,145,2) = 1
-    DEG(7,145,3) = 0
-    DEG(7,145,4) = 0
-    DEG(7,145,5) = 1
-    DEG(7,145,6) = 0
-    DEG(7,145,7) = 0
-    DEG(7,145,8) = 0
-    DEG(7,145,9) = 2
-    DEG(7,145,10) = 0
-    DEG(7,145,11) = 0
-    DEG(7,145,12) = 0
-  COEF(7,145) = (1.1495225991060447, 0)
-    DEG(7,146,1) = 0
-    DEG(7,146,2) = 0
-    DEG(7,146,3) = 1
-    DEG(7,146,4) = 0
-    DEG(7,146,5) = 1
-    DEG(7,146,6) = 0
-    DEG(7,146,7) = 0
-    DEG(7,146,8) = 0
-    DEG(7,146,9) = 2
-    DEG(7,146,10) = 0
-    DEG(7,146,11) = 0
-    DEG(7,146,12) = 0
-  COEF(7,146) = (0.5224851849521268, 0)
-    DEG(7,147,1) = 0
-    DEG(7,147,2) = 0
-    DEG(7,147,3) = 0
-    DEG(7,147,4) = 1
-    DEG(7,147,5) = 1
-    DEG(7,147,6) = 0
-    DEG(7,147,7) = 0
-    DEG(7,147,8) = 0
-    DEG(7,147,9) = 2
-    DEG(7,147,10) = 0
-    DEG(7,147,11) = 0
-    DEG(7,147,12) = 0
-  COEF(7,147) = (1.1266458467204603, 0)
-    DEG(7,148,1) = 0
-    DEG(7,148,2) = 0
-    DEG(7,148,3) = 0
-    DEG(7,148,4) = 0
-    DEG(7,148,5) = 2
-    DEG(7,148,6) = 0
-    DEG(7,148,7) = 0
-    DEG(7,148,8) = 0
-    DEG(7,148,9) = 2
-    DEG(7,148,10) = 0
-    DEG(7,148,11) = 0
-    DEG(7,148,12) = 0
-  COEF(7,148) = (-0.5747612995530224, 0)
-    DEG(7,149,1) = 1
-    DEG(7,149,2) = 0
-    DEG(7,149,3) = 0
-    DEG(7,149,4) = 0
-    DEG(7,149,5) = 0
-    DEG(7,149,6) = 1
-    DEG(7,149,7) = 0
-    DEG(7,149,8) = 0
-    DEG(7,149,9) = 2
-    DEG(7,149,10) = 0
-    DEG(7,149,11) = 0
-    DEG(7,149,12) = 0
-  COEF(7,149) = (-0.9328983128652609, 0)
-    DEG(7,150,1) = 0
-    DEG(7,150,2) = 1
-    DEG(7,150,3) = 0
-    DEG(7,150,4) = 0
-    DEG(7,150,5) = 0
-    DEG(7,150,6) = 1
-    DEG(7,150,7) = 0
-    DEG(7,150,8) = 0
-    DEG(7,150,9) = 2
-    DEG(7,150,10) = 0
-    DEG(7,150,11) = 0
-    DEG(7,150,12) = 0
-  COEF(7,150) = (0.5224851849521268, 0)
-    DEG(7,151,1) = 0
-    DEG(7,151,2) = 0
-    DEG(7,151,3) = 1
-    DEG(7,151,4) = 0
-    DEG(7,151,5) = 0
-    DEG(7,151,6) = 1
-    DEG(7,151,7) = 0
-    DEG(7,151,8) = 0
-    DEG(7,151,9) = 2
-    DEG(7,151,10) = 0
-    DEG(7,151,11) = 0
-    DEG(7,151,12) = 0
-  COEF(7,151) = (0.16424675732633237, 0)
-    DEG(7,152,1) = 0
-    DEG(7,152,2) = 0
-    DEG(7,152,3) = 0
-    DEG(7,152,4) = 1
-    DEG(7,152,5) = 0
-    DEG(7,152,6) = 1
-    DEG(7,152,7) = 0
-    DEG(7,152,8) = 0
-    DEG(7,152,9) = 2
-    DEG(7,152,10) = 0
-    DEG(7,152,11) = 0
-    DEG(7,152,12) = 0
-  COEF(7,152) = (0.9328983128652609, 0)
-    DEG(7,153,1) = 0
-    DEG(7,153,2) = 0
-    DEG(7,153,3) = 0
-    DEG(7,153,4) = 0
-    DEG(7,153,5) = 1
-    DEG(7,153,6) = 1
-    DEG(7,153,7) = 0
-    DEG(7,153,8) = 0
-    DEG(7,153,9) = 2
-    DEG(7,153,10) = 0
-    DEG(7,153,11) = 0
-    DEG(7,153,12) = 0
-  COEF(7,153) = (-0.5224851849521268, 0)
-    DEG(7,154,1) = 0
-    DEG(7,154,2) = 0
-    DEG(7,154,3) = 0
-    DEG(7,154,4) = 0
-    DEG(7,154,5) = 0
-    DEG(7,154,6) = 2
-    DEG(7,154,7) = 0
-    DEG(7,154,8) = 0
-    DEG(7,154,9) = 2
-    DEG(7,154,10) = 0
-    DEG(7,154,11) = 0
-    DEG(7,154,12) = 0
-  COEF(7,154) = (-0.08212337866316619, 0)
-    DEG(7,155,1) = 0
-    DEG(7,155,2) = 0
-    DEG(7,155,3) = 0
-    DEG(7,155,4) = 0
-    DEG(7,155,5) = 0
-    DEG(7,155,6) = 0
-    DEG(7,155,7) = 0
-    DEG(7,155,8) = 0
-    DEG(7,155,9) = 0
-    DEG(7,155,10) = 1
-    DEG(7,155,11) = 0
-    DEG(7,155,12) = 0
-  COEF(7,155) = (-3.097127621038468, 0)
-    DEG(7,156,1) = 1
-    DEG(7,156,2) = 0
-    DEG(7,156,3) = 0
-    DEG(7,156,4) = 1
-    DEG(7,156,5) = 0
-    DEG(7,156,6) = 0
-    DEG(7,156,7) = 0
-    DEG(7,156,8) = 0
-    DEG(7,156,9) = 0
-    DEG(7,156,10) = 1
-    DEG(7,156,11) = 0
-    DEG(7,156,12) = 0
-  COEF(7,156) = (3.097127621038468, 0)
-    DEG(7,157,1) = 1
-    DEG(7,157,2) = 0
-    DEG(7,157,3) = 0
-    DEG(7,157,4) = 0
-    DEG(7,157,5) = 1
-    DEG(7,157,6) = 0
-    DEG(7,157,7) = 0
-    DEG(7,157,8) = 0
-    DEG(7,157,9) = 0
-    DEG(7,157,10) = 1
-    DEG(7,157,11) = 0
-    DEG(7,157,12) = 0
-  COEF(7,157) = (-1.2529905603586213, 0)
-    DEG(7,158,1) = 1
-    DEG(7,158,2) = 0
-    DEG(7,158,3) = 0
-    DEG(7,158,4) = 0
-    DEG(7,158,5) = 0
-    DEG(7,158,6) = 1
-    DEG(7,158,7) = 0
-    DEG(7,158,8) = 0
-    DEG(7,158,9) = 0
-    DEG(7,158,10) = 1
-    DEG(7,158,11) = 0
-    DEG(7,158,12) = 0
-  COEF(7,158) = (1.4384699639162737, 0)
-    DEG(7,159,1) = 0
-    DEG(7,159,2) = 0
-    DEG(7,159,3) = 0
-    DEG(7,159,4) = 0
-    DEG(7,159,5) = 0
-    DEG(7,159,6) = 0
-    DEG(7,159,7) = 1
-    DEG(7,159,8) = 0
-    DEG(7,159,9) = 0
-    DEG(7,159,10) = 1
-    DEG(7,159,11) = 0
-    DEG(7,159,12) = 0
-  COEF(7,159) = (-2.1291504313711425, 0)
-    DEG(7,160,1) = 1
-    DEG(7,160,2) = 0
-    DEG(7,160,3) = 0
-    DEG(7,160,4) = 1
-    DEG(7,160,5) = 0
-    DEG(7,160,6) = 0
-    DEG(7,160,7) = 1
-    DEG(7,160,8) = 0
-    DEG(7,160,9) = 0
-    DEG(7,160,10) = 1
-    DEG(7,160,11) = 0
-    DEG(7,160,12) = 0
-  COEF(7,160) = (2.1291504313711425, 0)
-    DEG(7,161,1) = 1
-    DEG(7,161,2) = 0
-    DEG(7,161,3) = 0
-    DEG(7,161,4) = 0
-    DEG(7,161,5) = 1
-    DEG(7,161,6) = 0
-    DEG(7,161,7) = 1
-    DEG(7,161,8) = 0
-    DEG(7,161,9) = 0
-    DEG(7,161,10) = 1
-    DEG(7,161,11) = 0
-    DEG(7,161,12) = 0
-  COEF(7,161) = (-0.9894797748475348, 0)
-    DEG(7,162,1) = 1
-    DEG(7,162,2) = 0
-    DEG(7,162,3) = 0
-    DEG(7,162,4) = 0
-    DEG(7,162,5) = 0
-    DEG(7,162,6) = 1
-    DEG(7,162,7) = 1
-    DEG(7,162,8) = 0
-    DEG(7,162,9) = 0
-    DEG(7,162,10) = 1
-    DEG(7,162,11) = 0
-    DEG(7,162,12) = 0
-  COEF(7,162) = (0.3905088712789107, 0)
-    DEG(7,163,1) = 0
-    DEG(7,163,2) = 0
-    DEG(7,163,3) = 0
-    DEG(7,163,4) = 0
-    DEG(7,163,5) = 0
-    DEG(7,163,6) = 0
-    DEG(7,163,7) = 0
-    DEG(7,163,8) = 1
-    DEG(7,163,9) = 0
-    DEG(7,163,10) = 1
-    DEG(7,163,11) = 0
-    DEG(7,163,12) = 0
-  COEF(7,163) = (0.32619408766980745, 0)
-    DEG(7,164,1) = 1
-    DEG(7,164,2) = 0
-    DEG(7,164,3) = 0
-    DEG(7,164,4) = 1
-    DEG(7,164,5) = 0
-    DEG(7,164,6) = 0
-    DEG(7,164,7) = 0
-    DEG(7,164,8) = 1
-    DEG(7,164,9) = 0
-    DEG(7,164,10) = 1
-    DEG(7,164,11) = 0
-    DEG(7,164,12) = 0
-  COEF(7,164) = (-0.32619408766980745, 0)
-    DEG(7,165,1) = 1
-    DEG(7,165,2) = 0
-    DEG(7,165,3) = 0
-    DEG(7,165,4) = 0
-    DEG(7,165,5) = 1
-    DEG(7,165,6) = 0
-    DEG(7,165,7) = 0
-    DEG(7,165,8) = 1
-    DEG(7,165,9) = 0
-    DEG(7,165,10) = 1
-    DEG(7,165,11) = 0
-    DEG(7,165,12) = 0
-  COEF(7,165) = (-0.5996276630530785, 0)
-    DEG(7,166,1) = 1
-    DEG(7,166,2) = 0
-    DEG(7,166,3) = 0
-    DEG(7,166,4) = 0
-    DEG(7,166,5) = 0
-    DEG(7,166,6) = 1
-    DEG(7,166,7) = 0
-    DEG(7,166,8) = 1
-    DEG(7,166,9) = 0
-    DEG(7,166,10) = 1
-    DEG(7,166,11) = 0
-    DEG(7,166,12) = 0
-  COEF(7,166) = (3.698619795950377, 0)
-    DEG(7,167,1) = 0
-    DEG(7,167,2) = 0
-    DEG(7,167,3) = 0
-    DEG(7,167,4) = 0
-    DEG(7,167,5) = 0
-    DEG(7,167,6) = 0
-    DEG(7,167,7) = 0
-    DEG(7,167,8) = 0
-    DEG(7,167,9) = 1
-    DEG(7,167,10) = 1
-    DEG(7,167,11) = 0
-    DEG(7,167,12) = 0
-  COEF(7,167) = (-2.7501713391112306, 0)
-    DEG(7,168,1) = 1
-    DEG(7,168,2) = 0
-    DEG(7,168,3) = 0
-    DEG(7,168,4) = 1
-    DEG(7,168,5) = 0
-    DEG(7,168,6) = 0
-    DEG(7,168,7) = 0
-    DEG(7,168,8) = 0
-    DEG(7,168,9) = 1
-    DEG(7,168,10) = 1
-    DEG(7,168,11) = 0
-    DEG(7,168,12) = 0
-  COEF(7,168) = (2.7501713391112306, 0)
-    DEG(7,169,1) = 1
-    DEG(7,169,2) = 0
-    DEG(7,169,3) = 0
-    DEG(7,169,4) = 0
-    DEG(7,169,5) = 1
-    DEG(7,169,6) = 0
-    DEG(7,169,7) = 0
-    DEG(7,169,8) = 0
-    DEG(7,169,9) = 1
-    DEG(7,169,10) = 1
-    DEG(7,169,11) = 0
-    DEG(7,169,12) = 0
-  COEF(7,169) = (-1.1315549202353383, 0)
-    DEG(7,170,1) = 1
-    DEG(7,170,2) = 0
-    DEG(7,170,3) = 0
-    DEG(7,170,4) = 0
-    DEG(7,170,5) = 0
-    DEG(7,170,6) = 1
-    DEG(7,170,7) = 0
-    DEG(7,170,8) = 0
-    DEG(7,170,9) = 1
-    DEG(7,170,10) = 1
-    DEG(7,170,11) = 0
-    DEG(7,170,12) = 0
-  COEF(7,170) = (-0.2287063933386393, 0)
-    DEG(7,171,1) = 0
-    DEG(7,171,2) = 0
-    DEG(7,171,3) = 0
-    DEG(7,171,4) = 0
-    DEG(7,171,5) = 0
-    DEG(7,171,6) = 0
-    DEG(7,171,7) = 0
-    DEG(7,171,8) = 0
-    DEG(7,171,9) = 0
-    DEG(7,171,10) = 0
-    DEG(7,171,11) = 1
-    DEG(7,171,12) = 0
-  COEF(7,171) = (1.2529905603586213, 0)
-    DEG(7,172,1) = 0
-    DEG(7,172,2) = 1
-    DEG(7,172,3) = 0
-    DEG(7,172,4) = 1
-    DEG(7,172,5) = 0
-    DEG(7,172,6) = 0
-    DEG(7,172,7) = 0
-    DEG(7,172,8) = 0
-    DEG(7,172,9) = 0
-    DEG(7,172,10) = 0
-    DEG(7,172,11) = 1
-    DEG(7,172,12) = 0
-  COEF(7,172) = (3.097127621038468, 0)
-    DEG(7,173,1) = 0
-    DEG(7,173,2) = 1
-    DEG(7,173,3) = 0
-    DEG(7,173,4) = 0
-    DEG(7,173,5) = 1
-    DEG(7,173,6) = 0
-    DEG(7,173,7) = 0
-    DEG(7,173,8) = 0
-    DEG(7,173,9) = 0
-    DEG(7,173,10) = 0
-    DEG(7,173,11) = 1
-    DEG(7,173,12) = 0
-  COEF(7,173) = (-1.2529905603586213, 0)
-    DEG(7,174,1) = 0
-    DEG(7,174,2) = 1
-    DEG(7,174,3) = 0
-    DEG(7,174,4) = 0
-    DEG(7,174,5) = 0
-    DEG(7,174,6) = 1
-    DEG(7,174,7) = 0
-    DEG(7,174,8) = 0
-    DEG(7,174,9) = 0
-    DEG(7,174,10) = 0
-    DEG(7,174,11) = 1
-    DEG(7,174,12) = 0
-  COEF(7,174) = (1.4384699639162737, 0)
-    DEG(7,175,1) = 0
-    DEG(7,175,2) = 0
-    DEG(7,175,3) = 0
-    DEG(7,175,4) = 0
-    DEG(7,175,5) = 0
-    DEG(7,175,6) = 0
-    DEG(7,175,7) = 1
-    DEG(7,175,8) = 0
-    DEG(7,175,9) = 0
-    DEG(7,175,10) = 0
-    DEG(7,175,11) = 1
-    DEG(7,175,12) = 0
-  COEF(7,175) = (0.9894797748475348, 0)
-    DEG(7,176,1) = 0
-    DEG(7,176,2) = 1
-    DEG(7,176,3) = 0
-    DEG(7,176,4) = 1
-    DEG(7,176,5) = 0
-    DEG(7,176,6) = 0
-    DEG(7,176,7) = 1
-    DEG(7,176,8) = 0
-    DEG(7,176,9) = 0
-    DEG(7,176,10) = 0
-    DEG(7,176,11) = 1
-    DEG(7,176,12) = 0
-  COEF(7,176) = (2.1291504313711425, 0)
-    DEG(7,177,1) = 0
-    DEG(7,177,2) = 1
-    DEG(7,177,3) = 0
-    DEG(7,177,4) = 0
-    DEG(7,177,5) = 1
-    DEG(7,177,6) = 0
-    DEG(7,177,7) = 1
-    DEG(7,177,8) = 0
-    DEG(7,177,9) = 0
-    DEG(7,177,10) = 0
-    DEG(7,177,11) = 1
-    DEG(7,177,12) = 0
-  COEF(7,177) = (-0.9894797748475348, 0)
-    DEG(7,178,1) = 0
-    DEG(7,178,2) = 1
-    DEG(7,178,3) = 0
-    DEG(7,178,4) = 0
-    DEG(7,178,5) = 0
-    DEG(7,178,6) = 1
-    DEG(7,178,7) = 1
-    DEG(7,178,8) = 0
-    DEG(7,178,9) = 0
-    DEG(7,178,10) = 0
-    DEG(7,178,11) = 1
-    DEG(7,178,12) = 0
-  COEF(7,178) = (0.3905088712789107, 0)
-    DEG(7,179,1) = 0
-    DEG(7,179,2) = 0
-    DEG(7,179,3) = 0
-    DEG(7,179,4) = 0
-    DEG(7,179,5) = 0
-    DEG(7,179,6) = 0
-    DEG(7,179,7) = 0
-    DEG(7,179,8) = 1
-    DEG(7,179,9) = 0
-    DEG(7,179,10) = 0
-    DEG(7,179,11) = 1
-    DEG(7,179,12) = 0
-  COEF(7,179) = (0.5996276630530785, 0)
-    DEG(7,180,1) = 0
-    DEG(7,180,2) = 1
-    DEG(7,180,3) = 0
-    DEG(7,180,4) = 1
-    DEG(7,180,5) = 0
-    DEG(7,180,6) = 0
-    DEG(7,180,7) = 0
-    DEG(7,180,8) = 1
-    DEG(7,180,9) = 0
-    DEG(7,180,10) = 0
-    DEG(7,180,11) = 1
-    DEG(7,180,12) = 0
-  COEF(7,180) = (-0.32619408766980745, 0)
-    DEG(7,181,1) = 0
-    DEG(7,181,2) = 1
-    DEG(7,181,3) = 0
-    DEG(7,181,4) = 0
-    DEG(7,181,5) = 1
-    DEG(7,181,6) = 0
-    DEG(7,181,7) = 0
-    DEG(7,181,8) = 1
-    DEG(7,181,9) = 0
-    DEG(7,181,10) = 0
-    DEG(7,181,11) = 1
-    DEG(7,181,12) = 0
-  COEF(7,181) = (-0.5996276630530785, 0)
-    DEG(7,182,1) = 0
-    DEG(7,182,2) = 1
-    DEG(7,182,3) = 0
-    DEG(7,182,4) = 0
-    DEG(7,182,5) = 0
-    DEG(7,182,6) = 1
-    DEG(7,182,7) = 0
-    DEG(7,182,8) = 1
-    DEG(7,182,9) = 0
-    DEG(7,182,10) = 0
-    DEG(7,182,11) = 1
-    DEG(7,182,12) = 0
-  COEF(7,182) = (3.698619795950377, 0)
-    DEG(7,183,1) = 0
-    DEG(7,183,2) = 0
-    DEG(7,183,3) = 0
-    DEG(7,183,4) = 0
-    DEG(7,183,5) = 0
-    DEG(7,183,6) = 0
-    DEG(7,183,7) = 0
-    DEG(7,183,8) = 0
-    DEG(7,183,9) = 1
-    DEG(7,183,10) = 0
-    DEG(7,183,11) = 1
-    DEG(7,183,12) = 0
-  COEF(7,183) = (1.1315549202353383, 0)
-    DEG(7,184,1) = 0
-    DEG(7,184,2) = 1
-    DEG(7,184,3) = 0
-    DEG(7,184,4) = 1
-    DEG(7,184,5) = 0
-    DEG(7,184,6) = 0
-    DEG(7,184,7) = 0
-    DEG(7,184,8) = 0
-    DEG(7,184,9) = 1
-    DEG(7,184,10) = 0
-    DEG(7,184,11) = 1
-    DEG(7,184,12) = 0
-  COEF(7,184) = (2.7501713391112306, 0)
-    DEG(7,185,1) = 0
-    DEG(7,185,2) = 1
-    DEG(7,185,3) = 0
-    DEG(7,185,4) = 0
-    DEG(7,185,5) = 1
-    DEG(7,185,6) = 0
-    DEG(7,185,7) = 0
-    DEG(7,185,8) = 0
-    DEG(7,185,9) = 1
-    DEG(7,185,10) = 0
-    DEG(7,185,11) = 1
-    DEG(7,185,12) = 0
-  COEF(7,185) = (-1.1315549202353383, 0)
-    DEG(7,186,1) = 0
-    DEG(7,186,2) = 1
-    DEG(7,186,3) = 0
-    DEG(7,186,4) = 0
-    DEG(7,186,5) = 0
-    DEG(7,186,6) = 1
-    DEG(7,186,7) = 0
-    DEG(7,186,8) = 0
-    DEG(7,186,9) = 1
-    DEG(7,186,10) = 0
-    DEG(7,186,11) = 1
-    DEG(7,186,12) = 0
-  COEF(7,186) = (-0.2287063933386393, 0)
-    DEG(7,187,1) = 0
-    DEG(7,187,2) = 0
-    DEG(7,187,3) = 0
-    DEG(7,187,4) = 0
-    DEG(7,187,5) = 0
-    DEG(7,187,6) = 0
-    DEG(7,187,7) = 0
-    DEG(7,187,8) = 0
-    DEG(7,187,9) = 0
-    DEG(7,187,10) = 0
-    DEG(7,187,11) = 0
-    DEG(7,187,12) = 1
-  COEF(7,187) = (-1.4384699639162737, 0)
-    DEG(7,188,1) = 0
-    DEG(7,188,2) = 0
-    DEG(7,188,3) = 1
-    DEG(7,188,4) = 1
-    DEG(7,188,5) = 0
-    DEG(7,188,6) = 0
-    DEG(7,188,7) = 0
-    DEG(7,188,8) = 0
-    DEG(7,188,9) = 0
-    DEG(7,188,10) = 0
-    DEG(7,188,11) = 0
-    DEG(7,188,12) = 1
-  COEF(7,188) = (3.097127621038468, 0)
-    DEG(7,189,1) = 0
-    DEG(7,189,2) = 0
-    DEG(7,189,3) = 1
-    DEG(7,189,4) = 0
-    DEG(7,189,5) = 1
-    DEG(7,189,6) = 0
-    DEG(7,189,7) = 0
-    DEG(7,189,8) = 0
-    DEG(7,189,9) = 0
-    DEG(7,189,10) = 0
-    DEG(7,189,11) = 0
-    DEG(7,189,12) = 1
-  COEF(7,189) = (-1.2529905603586213, 0)
-    DEG(7,190,1) = 0
-    DEG(7,190,2) = 0
-    DEG(7,190,3) = 1
-    DEG(7,190,4) = 0
-    DEG(7,190,5) = 0
-    DEG(7,190,6) = 1
-    DEG(7,190,7) = 0
-    DEG(7,190,8) = 0
-    DEG(7,190,9) = 0
-    DEG(7,190,10) = 0
-    DEG(7,190,11) = 0
-    DEG(7,190,12) = 1
-  COEF(7,190) = (1.4384699639162737, 0)
-    DEG(7,191,1) = 0
-    DEG(7,191,2) = 0
-    DEG(7,191,3) = 0
-    DEG(7,191,4) = 0
-    DEG(7,191,5) = 0
-    DEG(7,191,6) = 0
-    DEG(7,191,7) = 1
-    DEG(7,191,8) = 0
-    DEG(7,191,9) = 0
-    DEG(7,191,10) = 0
-    DEG(7,191,11) = 0
-    DEG(7,191,12) = 1
-  COEF(7,191) = (-0.3905088712789107, 0)
-    DEG(7,192,1) = 0
-    DEG(7,192,2) = 0
-    DEG(7,192,3) = 1
-    DEG(7,192,4) = 1
-    DEG(7,192,5) = 0
-    DEG(7,192,6) = 0
-    DEG(7,192,7) = 1
-    DEG(7,192,8) = 0
-    DEG(7,192,9) = 0
-    DEG(7,192,10) = 0
-    DEG(7,192,11) = 0
-    DEG(7,192,12) = 1
-  COEF(7,192) = (2.1291504313711425, 0)
-    DEG(7,193,1) = 0
-    DEG(7,193,2) = 0
-    DEG(7,193,3) = 1
-    DEG(7,193,4) = 0
-    DEG(7,193,5) = 1
-    DEG(7,193,6) = 0
-    DEG(7,193,7) = 1
-    DEG(7,193,8) = 0
-    DEG(7,193,9) = 0
-    DEG(7,193,10) = 0
-    DEG(7,193,11) = 0
-    DEG(7,193,12) = 1
-  COEF(7,193) = (-0.9894797748475348, 0)
-    DEG(7,194,1) = 0
-    DEG(7,194,2) = 0
-    DEG(7,194,3) = 1
-    DEG(7,194,4) = 0
-    DEG(7,194,5) = 0
-    DEG(7,194,6) = 1
-    DEG(7,194,7) = 1
-    DEG(7,194,8) = 0
-    DEG(7,194,9) = 0
-    DEG(7,194,10) = 0
-    DEG(7,194,11) = 0
-    DEG(7,194,12) = 1
-  COEF(7,194) = (0.3905088712789107, 0)
-    DEG(7,195,1) = 0
-    DEG(7,195,2) = 0
-    DEG(7,195,3) = 0
-    DEG(7,195,4) = 0
-    DEG(7,195,5) = 0
-    DEG(7,195,6) = 0
-    DEG(7,195,7) = 0
-    DEG(7,195,8) = 1
-    DEG(7,195,9) = 0
-    DEG(7,195,10) = 0
-    DEG(7,195,11) = 0
-    DEG(7,195,12) = 1
-  COEF(7,195) = (-3.698619795950377, 0)
-    DEG(7,196,1) = 0
-    DEG(7,196,2) = 0
-    DEG(7,196,3) = 1
-    DEG(7,196,4) = 1
-    DEG(7,196,5) = 0
-    DEG(7,196,6) = 0
-    DEG(7,196,7) = 0
-    DEG(7,196,8) = 1
-    DEG(7,196,9) = 0
-    DEG(7,196,10) = 0
-    DEG(7,196,11) = 0
-    DEG(7,196,12) = 1
-  COEF(7,196) = (-0.32619408766980745, 0)
-    DEG(7,197,1) = 0
-    DEG(7,197,2) = 0
-    DEG(7,197,3) = 1
-    DEG(7,197,4) = 0
-    DEG(7,197,5) = 1
-    DEG(7,197,6) = 0
-    DEG(7,197,7) = 0
-    DEG(7,197,8) = 1
-    DEG(7,197,9) = 0
-    DEG(7,197,10) = 0
-    DEG(7,197,11) = 0
-    DEG(7,197,12) = 1
-  COEF(7,197) = (-0.5996276630530785, 0)
-    DEG(7,198,1) = 0
-    DEG(7,198,2) = 0
-    DEG(7,198,3) = 1
-    DEG(7,198,4) = 0
-    DEG(7,198,5) = 0
-    DEG(7,198,6) = 1
-    DEG(7,198,7) = 0
-    DEG(7,198,8) = 1
-    DEG(7,198,9) = 0
-    DEG(7,198,10) = 0
-    DEG(7,198,11) = 0
-    DEG(7,198,12) = 1
-  COEF(7,198) = (3.698619795950377, 0)
-    DEG(7,199,1) = 0
-    DEG(7,199,2) = 0
-    DEG(7,199,3) = 0
-    DEG(7,199,4) = 0
-    DEG(7,199,5) = 0
-    DEG(7,199,6) = 0
-    DEG(7,199,7) = 0
-    DEG(7,199,8) = 0
-    DEG(7,199,9) = 1
-    DEG(7,199,10) = 0
-    DEG(7,199,11) = 0
-    DEG(7,199,12) = 1
-  COEF(7,199) = (0.2287063933386393, 0)
-    DEG(7,200,1) = 0
-    DEG(7,200,2) = 0
-    DEG(7,200,3) = 1
-    DEG(7,200,4) = 1
-    DEG(7,200,5) = 0
-    DEG(7,200,6) = 0
-    DEG(7,200,7) = 0
-    DEG(7,200,8) = 0
-    DEG(7,200,9) = 1
-    DEG(7,200,10) = 0
-    DEG(7,200,11) = 0
-    DEG(7,200,12) = 1
-  COEF(7,200) = (2.7501713391112306, 0)
-    DEG(7,201,1) = 0
-    DEG(7,201,2) = 0
-    DEG(7,201,3) = 1
-    DEG(7,201,4) = 0
-    DEG(7,201,5) = 1
-    DEG(7,201,6) = 0
-    DEG(7,201,7) = 0
-    DEG(7,201,8) = 0
-    DEG(7,201,9) = 1
-    DEG(7,201,10) = 0
-    DEG(7,201,11) = 0
-    DEG(7,201,12) = 1
-  COEF(7,201) = (-1.1315549202353383, 0)
-    DEG(7,202,1) = 0
-    DEG(7,202,2) = 0
-    DEG(7,202,3) = 1
-    DEG(7,202,4) = 0
-    DEG(7,202,5) = 0
-    DEG(7,202,6) = 1
-    DEG(7,202,7) = 0
-    DEG(7,202,8) = 0
-    DEG(7,202,9) = 1
-    DEG(7,202,10) = 0
-    DEG(7,202,11) = 0
-    DEG(7,202,12) = 1
-  COEF(7,202) = (-0.2287063933386393, 0)
-
-NUM_TERMS(8) = 202
-    DEG(8,1,1) = 0
-    DEG(8,1,2) = 0
-    DEG(8,1,3) = 0
-    DEG(8,1,4) = 0
-    DEG(8,1,5) = 0
-    DEG(8,1,6) = 0
-    DEG(8,1,7) = 0
-    DEG(8,1,8) = 0
-    DEG(8,1,9) = 0
-    DEG(8,1,10) = 0
-    DEG(8,1,11) = 0
-    DEG(8,1,12) = 0
-  COEF(8,1) = (-0.927714784763285, 0)
-    DEG(8,2,1) = 1
-    DEG(8,2,2) = 0
-    DEG(8,2,3) = 0
-    DEG(8,2,4) = 1
-    DEG(8,2,5) = 0
-    DEG(8,2,6) = 0
-    DEG(8,2,7) = 0
-    DEG(8,2,8) = 0
-    DEG(8,2,9) = 0
-    DEG(8,2,10) = 0
-    DEG(8,2,11) = 0
-    DEG(8,2,12) = 0
-  COEF(8,2) = (1.9687322931735043, 0)
-    DEG(8,3,1) = 0
-    DEG(8,3,2) = 1
-    DEG(8,3,3) = 0
-    DEG(8,3,4) = 1
-    DEG(8,3,5) = 0
-    DEG(8,3,6) = 0
-    DEG(8,3,7) = 0
-    DEG(8,3,8) = 0
-    DEG(8,3,9) = 0
-    DEG(8,3,10) = 0
-    DEG(8,3,11) = 0
-    DEG(8,3,12) = 0
-  COEF(8,3) = (-0.07971589396427332, 0)
-    DEG(8,4,1) = 0
-    DEG(8,4,2) = 0
-    DEG(8,4,3) = 1
-    DEG(8,4,4) = 1
-    DEG(8,4,5) = 0
-    DEG(8,4,6) = 0
-    DEG(8,4,7) = 0
-    DEG(8,4,8) = 0
-    DEG(8,4,9) = 0
-    DEG(8,4,10) = 0
-    DEG(8,4,11) = 0
-    DEG(8,4,12) = 0
-  COEF(8,4) = (-0.2076534666012874, 0)
-    DEG(8,5,1) = 0
-    DEG(8,5,2) = 0
-    DEG(8,5,3) = 0
-    DEG(8,5,4) = 2
-    DEG(8,5,5) = 0
-    DEG(8,5,6) = 0
-    DEG(8,5,7) = 0
-    DEG(8,5,8) = 0
-    DEG(8,5,9) = 0
-    DEG(8,5,10) = 0
-    DEG(8,5,11) = 0
-    DEG(8,5,12) = 0
-  COEF(8,5) = (-0.9843661465867521, 0)
-    DEG(8,6,1) = 1
-    DEG(8,6,2) = 0
-    DEG(8,6,3) = 0
-    DEG(8,6,4) = 0
-    DEG(8,6,5) = 1
-    DEG(8,6,6) = 0
-    DEG(8,6,7) = 0
-    DEG(8,6,8) = 0
-    DEG(8,6,9) = 0
-    DEG(8,6,10) = 0
-    DEG(8,6,11) = 0
-    DEG(8,6,12) = 0
-  COEF(8,6) = (-0.07971589396427332, 0)
-    DEG(8,7,1) = 0
-    DEG(8,7,2) = 1
-    DEG(8,7,3) = 0
-    DEG(8,7,4) = 0
-    DEG(8,7,5) = 1
-    DEG(8,7,6) = 0
-    DEG(8,7,7) = 0
-    DEG(8,7,8) = 0
-    DEG(8,7,9) = 0
-    DEG(8,7,10) = 0
-    DEG(8,7,11) = 0
-    DEG(8,7,12) = 0
-  COEF(8,7) = (0.002890251077010053, 0)
-    DEG(8,8,1) = 0
-    DEG(8,8,2) = 0
-    DEG(8,8,3) = 1
-    DEG(8,8,4) = 0
-    DEG(8,8,5) = 1
-    DEG(8,8,6) = 0
-    DEG(8,8,7) = 0
-    DEG(8,8,8) = 0
-    DEG(8,8,9) = 0
-    DEG(8,8,10) = 0
-    DEG(8,8,11) = 0
-    DEG(8,8,12) = 0
-  COEF(8,8) = (0.015235273700025727, 0)
-    DEG(8,9,1) = 0
-    DEG(8,9,2) = 0
-    DEG(8,9,3) = 0
-    DEG(8,9,4) = 1
-    DEG(8,9,5) = 1
-    DEG(8,9,6) = 0
-    DEG(8,9,7) = 0
-    DEG(8,9,8) = 0
-    DEG(8,9,9) = 0
-    DEG(8,9,10) = 0
-    DEG(8,9,11) = 0
-    DEG(8,9,12) = 0
-  COEF(8,9) = (0.07971589396427332, 0)
-    DEG(8,10,1) = 0
-    DEG(8,10,2) = 0
-    DEG(8,10,3) = 0
-    DEG(8,10,4) = 0
-    DEG(8,10,5) = 2
-    DEG(8,10,6) = 0
-    DEG(8,10,7) = 0
-    DEG(8,10,8) = 0
-    DEG(8,10,9) = 0
-    DEG(8,10,10) = 0
-    DEG(8,10,11) = 0
-    DEG(8,10,12) = 0
-  COEF(8,10) = (-0.0014451255385050266, 0)
-    DEG(8,11,1) = 1
-    DEG(8,11,2) = 0
-    DEG(8,11,3) = 0
-    DEG(8,11,4) = 0
-    DEG(8,11,5) = 0
-    DEG(8,11,6) = 1
-    DEG(8,11,7) = 0
-    DEG(8,11,8) = 0
-    DEG(8,11,9) = 0
-    DEG(8,11,10) = 0
-    DEG(8,11,11) = 0
-    DEG(8,11,12) = 0
-  COEF(8,11) = (-0.2076534666012874, 0)
-    DEG(8,12,1) = 0
-    DEG(8,12,2) = 1
-    DEG(8,12,3) = 0
-    DEG(8,12,4) = 0
-    DEG(8,12,5) = 0
-    DEG(8,12,6) = 1
-    DEG(8,12,7) = 0
-    DEG(8,12,8) = 0
-    DEG(8,12,9) = 0
-    DEG(8,12,10) = 0
-    DEG(8,12,11) = 0
-    DEG(8,12,12) = 0
-  COEF(8,12) = (0.015235273700025727, 0)
-    DEG(8,13,1) = 0
-    DEG(8,13,2) = 0
-    DEG(8,13,3) = 1
-    DEG(8,13,4) = 0
-    DEG(8,13,5) = 0
-    DEG(8,13,6) = 1
-    DEG(8,13,7) = 0
-    DEG(8,13,8) = 0
-    DEG(8,13,9) = 0
-    DEG(8,13,10) = 0
-    DEG(8,13,11) = 0
-    DEG(8,13,12) = 0
-  COEF(8,13) = (-0.11619297472394441, 0)
-    DEG(8,14,1) = 0
-    DEG(8,14,2) = 0
-    DEG(8,14,3) = 0
-    DEG(8,14,4) = 1
-    DEG(8,14,5) = 0
-    DEG(8,14,6) = 1
-    DEG(8,14,7) = 0
-    DEG(8,14,8) = 0
-    DEG(8,14,9) = 0
-    DEG(8,14,10) = 0
-    DEG(8,14,11) = 0
-    DEG(8,14,12) = 0
-  COEF(8,14) = (0.2076534666012874, 0)
-    DEG(8,15,1) = 0
-    DEG(8,15,2) = 0
-    DEG(8,15,3) = 0
-    DEG(8,15,4) = 0
-    DEG(8,15,5) = 1
-    DEG(8,15,6) = 1
-    DEG(8,15,7) = 0
-    DEG(8,15,8) = 0
-    DEG(8,15,9) = 0
-    DEG(8,15,10) = 0
-    DEG(8,15,11) = 0
-    DEG(8,15,12) = 0
-  COEF(8,15) = (-0.015235273700025727, 0)
-    DEG(8,16,1) = 0
-    DEG(8,16,2) = 0
-    DEG(8,16,3) = 0
-    DEG(8,16,4) = 0
-    DEG(8,16,5) = 0
-    DEG(8,16,6) = 2
-    DEG(8,16,7) = 0
-    DEG(8,16,8) = 0
-    DEG(8,16,9) = 0
-    DEG(8,16,10) = 0
-    DEG(8,16,11) = 0
-    DEG(8,16,12) = 0
-  COEF(8,16) = (0.058096487361972204, 0)
-    DEG(8,17,1) = 0
-    DEG(8,17,2) = 0
-    DEG(8,17,3) = 0
-    DEG(8,17,4) = 0
-    DEG(8,17,5) = 0
-    DEG(8,17,6) = 0
-    DEG(8,17,7) = 1
-    DEG(8,17,8) = 0
-    DEG(8,17,9) = 0
-    DEG(8,17,10) = 0
-    DEG(8,17,11) = 0
-    DEG(8,17,12) = 0
-  COEF(8,17) = (-1.6819761261504786, 0)
-    DEG(8,18,1) = 1
-    DEG(8,18,2) = 0
-    DEG(8,18,3) = 0
-    DEG(8,18,4) = 1
-    DEG(8,18,5) = 0
-    DEG(8,18,6) = 0
-    DEG(8,18,7) = 1
-    DEG(8,18,8) = 0
-    DEG(8,18,9) = 0
-    DEG(8,18,10) = 0
-    DEG(8,18,11) = 0
-    DEG(8,18,12) = 0
-  COEF(8,18) = (3.476976694103156, 0)
-    DEG(8,19,1) = 0
-    DEG(8,19,2) = 1
-    DEG(8,19,3) = 0
-    DEG(8,19,4) = 1
-    DEG(8,19,5) = 0
-    DEG(8,19,6) = 0
-    DEG(8,19,7) = 1
-    DEG(8,19,8) = 0
-    DEG(8,19,9) = 0
-    DEG(8,19,10) = 0
-    DEG(8,19,11) = 0
-    DEG(8,19,12) = 0
-  COEF(8,19) = (0.8504110775678352, 0)
-    DEG(8,20,1) = 0
-    DEG(8,20,2) = 0
-    DEG(8,20,3) = 1
-    DEG(8,20,4) = 1
-    DEG(8,20,5) = 0
-    DEG(8,20,6) = 0
-    DEG(8,20,7) = 1
-    DEG(8,20,8) = 0
-    DEG(8,20,9) = 0
-    DEG(8,20,10) = 0
-    DEG(8,20,11) = 0
-    DEG(8,20,12) = 0
-  COEF(8,20) = (0.04018579254248608, 0)
-    DEG(8,21,1) = 0
-    DEG(8,21,2) = 0
-    DEG(8,21,3) = 0
-    DEG(8,21,4) = 2
-    DEG(8,21,5) = 0
-    DEG(8,21,6) = 0
-    DEG(8,21,7) = 1
-    DEG(8,21,8) = 0
-    DEG(8,21,9) = 0
-    DEG(8,21,10) = 0
-    DEG(8,21,11) = 0
-    DEG(8,21,12) = 0
-  COEF(8,21) = (-1.738488347051578, 0)
-    DEG(8,22,1) = 1
-    DEG(8,22,2) = 0
-    DEG(8,22,3) = 0
-    DEG(8,22,4) = 0
-    DEG(8,22,5) = 1
-    DEG(8,22,6) = 0
-    DEG(8,22,7) = 1
-    DEG(8,22,8) = 0
-    DEG(8,22,9) = 0
-    DEG(8,22,10) = 0
-    DEG(8,22,11) = 0
-    DEG(8,22,12) = 0
-  COEF(8,22) = (0.8504110775678352, 0)
-    DEG(8,23,1) = 0
-    DEG(8,23,2) = 1
-    DEG(8,23,3) = 0
-    DEG(8,23,4) = 0
-    DEG(8,23,5) = 1
-    DEG(8,23,6) = 0
-    DEG(8,23,7) = 1
-    DEG(8,23,8) = 0
-    DEG(8,23,9) = 0
-    DEG(8,23,10) = 0
-    DEG(8,23,11) = 0
-    DEG(8,23,12) = 0
-  COEF(8,23) = (-0.12488779051176192, 0)
-    DEG(8,24,1) = 0
-    DEG(8,24,2) = 0
-    DEG(8,24,3) = 1
-    DEG(8,24,4) = 0
-    DEG(8,24,5) = 1
-    DEG(8,24,6) = 0
-    DEG(8,24,7) = 1
-    DEG(8,24,8) = 0
-    DEG(8,24,9) = 0
-    DEG(8,24,10) = 0
-    DEG(8,24,11) = 0
-    DEG(8,24,12) = 0
-  COEF(8,24) = (0.4012777838933282, 0)
-    DEG(8,25,1) = 0
-    DEG(8,25,2) = 0
-    DEG(8,25,3) = 0
-    DEG(8,25,4) = 1
-    DEG(8,25,5) = 1
-    DEG(8,25,6) = 0
-    DEG(8,25,7) = 1
-    DEG(8,25,8) = 0
-    DEG(8,25,9) = 0
-    DEG(8,25,10) = 0
-    DEG(8,25,11) = 0
-    DEG(8,25,12) = 0
-  COEF(8,25) = (-0.8504110775678352, 0)
-    DEG(8,26,1) = 0
-    DEG(8,26,2) = 0
-    DEG(8,26,3) = 0
-    DEG(8,26,4) = 0
-    DEG(8,26,5) = 2
-    DEG(8,26,6) = 0
-    DEG(8,26,7) = 1
-    DEG(8,26,8) = 0
-    DEG(8,26,9) = 0
-    DEG(8,26,10) = 0
-    DEG(8,26,11) = 0
-    DEG(8,26,12) = 0
-  COEF(8,26) = (0.06244389525588096, 0)
-    DEG(8,27,1) = 1
-    DEG(8,27,2) = 0
-    DEG(8,27,3) = 0
-    DEG(8,27,4) = 0
-    DEG(8,27,5) = 0
-    DEG(8,27,6) = 1
-    DEG(8,27,7) = 1
-    DEG(8,27,8) = 0
-    DEG(8,27,9) = 0
-    DEG(8,27,10) = 0
-    DEG(8,27,11) = 0
-    DEG(8,27,12) = 0
-  COEF(8,27) = (0.04018579254248608, 0)
-    DEG(8,28,1) = 0
-    DEG(8,28,2) = 1
-    DEG(8,28,3) = 0
-    DEG(8,28,4) = 0
-    DEG(8,28,5) = 0
-    DEG(8,28,6) = 1
-    DEG(8,28,7) = 1
-    DEG(8,28,8) = 0
-    DEG(8,28,9) = 0
-    DEG(8,28,10) = 0
-    DEG(8,28,11) = 0
-    DEG(8,28,12) = 0
-  COEF(8,28) = (0.4012777838933282, 0)
-    DEG(8,29,1) = 0
-    DEG(8,29,2) = 0
-    DEG(8,29,3) = 1
-    DEG(8,29,4) = 0
-    DEG(8,29,5) = 0
-    DEG(8,29,6) = 1
-    DEG(8,29,7) = 1
-    DEG(8,29,8) = 0
-    DEG(8,29,9) = 0
-    DEG(8,29,10) = 0
-    DEG(8,29,11) = 0
-    DEG(8,29,12) = 0
-  COEF(8,29) = (0.011863348709563416, 0)
-    DEG(8,30,1) = 0
-    DEG(8,30,2) = 0
-    DEG(8,30,3) = 0
-    DEG(8,30,4) = 1
-    DEG(8,30,5) = 0
-    DEG(8,30,6) = 1
-    DEG(8,30,7) = 1
-    DEG(8,30,8) = 0
-    DEG(8,30,9) = 0
-    DEG(8,30,10) = 0
-    DEG(8,30,11) = 0
-    DEG(8,30,12) = 0
-  COEF(8,30) = (-0.04018579254248608, 0)
-    DEG(8,31,1) = 0
-    DEG(8,31,2) = 0
-    DEG(8,31,3) = 0
-    DEG(8,31,4) = 0
-    DEG(8,31,5) = 1
-    DEG(8,31,6) = 1
-    DEG(8,31,7) = 1
-    DEG(8,31,8) = 0
-    DEG(8,31,9) = 0
-    DEG(8,31,10) = 0
-    DEG(8,31,11) = 0
-    DEG(8,31,12) = 0
-  COEF(8,31) = (-0.4012777838933282, 0)
-    DEG(8,32,1) = 0
-    DEG(8,32,2) = 0
-    DEG(8,32,3) = 0
-    DEG(8,32,4) = 0
-    DEG(8,32,5) = 0
-    DEG(8,32,6) = 2
-    DEG(8,32,7) = 1
-    DEG(8,32,8) = 0
-    DEG(8,32,9) = 0
-    DEG(8,32,10) = 0
-    DEG(8,32,11) = 0
-    DEG(8,32,12) = 0
-  COEF(8,32) = (-0.005931674354781708, 0)
-    DEG(8,33,1) = 1
-    DEG(8,33,2) = 0
-    DEG(8,33,3) = 0
-    DEG(8,33,4) = 1
-    DEG(8,33,5) = 0
-    DEG(8,33,6) = 0
-    DEG(8,33,7) = 2
-    DEG(8,33,8) = 0
-    DEG(8,33,9) = 0
-    DEG(8,33,10) = 0
-    DEG(8,33,11) = 0
-    DEG(8,33,12) = 0
-  COEF(8,33) = (1.3949975990890469, 0)
-    DEG(8,34,1) = 0
-    DEG(8,34,2) = 1
-    DEG(8,34,3) = 0
-    DEG(8,34,4) = 1
-    DEG(8,34,5) = 0
-    DEG(8,34,6) = 0
-    DEG(8,34,7) = 2
-    DEG(8,34,8) = 0
-    DEG(8,34,9) = 0
-    DEG(8,34,10) = 0
-    DEG(8,34,11) = 0
-    DEG(8,34,12) = 0
-  COEF(8,34) = (0.3121387092101098, 0)
-    DEG(8,35,1) = 0
-    DEG(8,35,2) = 0
-    DEG(8,35,3) = 1
-    DEG(8,35,4) = 1
-    DEG(8,35,5) = 0
-    DEG(8,35,6) = 0
-    DEG(8,35,7) = 2
-    DEG(8,35,8) = 0
-    DEG(8,35,9) = 0
-    DEG(8,35,10) = 0
-    DEG(8,35,11) = 0
-    DEG(8,35,12) = 0
-  COEF(8,35) = (0.059602482937593924, 0)
-    DEG(8,36,1) = 0
-    DEG(8,36,2) = 0
-    DEG(8,36,3) = 0
-    DEG(8,36,4) = 2
-    DEG(8,36,5) = 0
-    DEG(8,36,6) = 0
-    DEG(8,36,7) = 2
-    DEG(8,36,8) = 0
-    DEG(8,36,9) = 0
-    DEG(8,36,10) = 0
-    DEG(8,36,11) = 0
-    DEG(8,36,12) = 0
-  COEF(8,36) = (-0.6974987995445234, 0)
-    DEG(8,37,1) = 1
-    DEG(8,37,2) = 0
-    DEG(8,37,3) = 0
-    DEG(8,37,4) = 0
-    DEG(8,37,5) = 1
-    DEG(8,37,6) = 0
-    DEG(8,37,7) = 2
-    DEG(8,37,8) = 0
-    DEG(8,37,9) = 0
-    DEG(8,37,10) = 0
-    DEG(8,37,11) = 0
-    DEG(8,37,12) = 0
-  COEF(8,37) = (0.3121387092101098, 0)
-    DEG(8,38,1) = 0
-    DEG(8,38,2) = 1
-    DEG(8,38,3) = 0
-    DEG(8,38,4) = 0
-    DEG(8,38,5) = 1
-    DEG(8,38,6) = 0
-    DEG(8,38,7) = 2
-    DEG(8,38,8) = 0
-    DEG(8,38,9) = 0
-    DEG(8,38,10) = 0
-    DEG(8,38,11) = 0
-    DEG(8,38,12) = 0
-  COEF(8,38) = (-1.3970239105787097, 0)
-    DEG(8,39,1) = 0
-    DEG(8,39,2) = 0
-    DEG(8,39,3) = 1
-    DEG(8,39,4) = 0
-    DEG(8,39,5) = 1
-    DEG(8,39,6) = 0
-    DEG(8,39,7) = 2
-    DEG(8,39,8) = 0
-    DEG(8,39,9) = 0
-    DEG(8,39,10) = 0
-    DEG(8,39,11) = 0
-    DEG(8,39,12) = 0
-  COEF(8,39) = (-0.014288712409025647, 0)
-    DEG(8,40,1) = 0
-    DEG(8,40,2) = 0
-    DEG(8,40,3) = 0
-    DEG(8,40,4) = 1
-    DEG(8,40,5) = 1
-    DEG(8,40,6) = 0
-    DEG(8,40,7) = 2
-    DEG(8,40,8) = 0
-    DEG(8,40,9) = 0
-    DEG(8,40,10) = 0
-    DEG(8,40,11) = 0
-    DEG(8,40,12) = 0
-  COEF(8,40) = (-0.3121387092101098, 0)
-    DEG(8,41,1) = 0
-    DEG(8,41,2) = 0
-    DEG(8,41,3) = 0
-    DEG(8,41,4) = 0
-    DEG(8,41,5) = 2
-    DEG(8,41,6) = 0
-    DEG(8,41,7) = 2
-    DEG(8,41,8) = 0
-    DEG(8,41,9) = 0
-    DEG(8,41,10) = 0
-    DEG(8,41,11) = 0
-    DEG(8,41,12) = 0
-  COEF(8,41) = (0.6985119552893548, 0)
-    DEG(8,42,1) = 1
-    DEG(8,42,2) = 0
-    DEG(8,42,3) = 0
-    DEG(8,42,4) = 0
-    DEG(8,42,5) = 0
-    DEG(8,42,6) = 1
-    DEG(8,42,7) = 2
-    DEG(8,42,8) = 0
-    DEG(8,42,9) = 0
-    DEG(8,42,10) = 0
-    DEG(8,42,11) = 0
-    DEG(8,42,12) = 0
-  COEF(8,42) = (0.059602482937593924, 0)
-    DEG(8,43,1) = 0
-    DEG(8,43,2) = 1
-    DEG(8,43,3) = 0
-    DEG(8,43,4) = 0
-    DEG(8,43,5) = 0
-    DEG(8,43,6) = 1
-    DEG(8,43,7) = 2
-    DEG(8,43,8) = 0
-    DEG(8,43,9) = 0
-    DEG(8,43,10) = 0
-    DEG(8,43,11) = 0
-    DEG(8,43,12) = 0
-  COEF(8,43) = (-0.014288712409025647, 0)
-    DEG(8,44,1) = 0
-    DEG(8,44,2) = 0
-    DEG(8,44,3) = 1
-    DEG(8,44,4) = 0
-    DEG(8,44,5) = 0
-    DEG(8,44,6) = 1
-    DEG(8,44,7) = 2
-    DEG(8,44,8) = 0
-    DEG(8,44,9) = 0
-    DEG(8,44,10) = 0
-    DEG(8,44,11) = 0
-    DEG(8,44,12) = 0
-  COEF(8,44) = (0.0020263114896629133, 0)
-    DEG(8,45,1) = 0
-    DEG(8,45,2) = 0
-    DEG(8,45,3) = 0
-    DEG(8,45,4) = 1
-    DEG(8,45,5) = 0
-    DEG(8,45,6) = 1
-    DEG(8,45,7) = 2
-    DEG(8,45,8) = 0
-    DEG(8,45,9) = 0
-    DEG(8,45,10) = 0
-    DEG(8,45,11) = 0
-    DEG(8,45,12) = 0
-  COEF(8,45) = (-0.059602482937593924, 0)
-    DEG(8,46,1) = 0
-    DEG(8,46,2) = 0
-    DEG(8,46,3) = 0
-    DEG(8,46,4) = 0
-    DEG(8,46,5) = 1
-    DEG(8,46,6) = 1
-    DEG(8,46,7) = 2
-    DEG(8,46,8) = 0
-    DEG(8,46,9) = 0
-    DEG(8,46,10) = 0
-    DEG(8,46,11) = 0
-    DEG(8,46,12) = 0
-  COEF(8,46) = (0.014288712409025647, 0)
-    DEG(8,47,1) = 0
-    DEG(8,47,2) = 0
-    DEG(8,47,3) = 0
-    DEG(8,47,4) = 0
-    DEG(8,47,5) = 0
-    DEG(8,47,6) = 2
-    DEG(8,47,7) = 2
-    DEG(8,47,8) = 0
-    DEG(8,47,9) = 0
-    DEG(8,47,10) = 0
-    DEG(8,47,11) = 0
-    DEG(8,47,12) = 0
-  COEF(8,47) = (-0.0010131557448314567, 0)
-    DEG(8,48,1) = 0
-    DEG(8,48,2) = 0
-    DEG(8,48,3) = 0
-    DEG(8,48,4) = 0
-    DEG(8,48,5) = 0
-    DEG(8,48,6) = 0
-    DEG(8,48,7) = 0
-    DEG(8,48,8) = 1
-    DEG(8,48,9) = 0
-    DEG(8,48,10) = 0
-    DEG(8,48,11) = 0
-    DEG(8,48,12) = 0
-  COEF(8,48) = (-0.49132971021693705, 0)
-    DEG(8,49,1) = 1
-    DEG(8,49,2) = 0
-    DEG(8,49,3) = 0
-    DEG(8,49,4) = 1
-    DEG(8,49,5) = 0
-    DEG(8,49,6) = 0
-    DEG(8,49,7) = 0
-    DEG(8,49,8) = 1
-    DEG(8,49,9) = 0
-    DEG(8,49,10) = 0
-    DEG(8,49,11) = 0
-    DEG(8,49,12) = 0
-  COEF(8,49) = (0.6263387587193047, 0)
-    DEG(8,50,1) = 0
-    DEG(8,50,2) = 1
-    DEG(8,50,3) = 0
-    DEG(8,50,4) = 1
-    DEG(8,50,5) = 0
-    DEG(8,50,6) = 0
-    DEG(8,50,7) = 0
-    DEG(8,50,8) = 1
-    DEG(8,50,9) = 0
-    DEG(8,50,10) = 0
-    DEG(8,50,11) = 0
-    DEG(8,50,12) = 0
-  COEF(8,50) = (-0.7915615843824603, 0)
-    DEG(8,51,1) = 0
-    DEG(8,51,2) = 0
-    DEG(8,51,3) = 1
-    DEG(8,51,4) = 1
-    DEG(8,51,5) = 0
-    DEG(8,51,6) = 0
-    DEG(8,51,7) = 0
-    DEG(8,51,8) = 1
-    DEG(8,51,9) = 0
-    DEG(8,51,10) = 0
-    DEG(8,51,11) = 0
-    DEG(8,51,12) = 0
-  COEF(8,51) = (2.1446475318833795, 0)
-    DEG(8,52,1) = 0
-    DEG(8,52,2) = 0
-    DEG(8,52,3) = 0
-    DEG(8,52,4) = 2
-    DEG(8,52,5) = 0
-    DEG(8,52,6) = 0
-    DEG(8,52,7) = 0
-    DEG(8,52,8) = 1
-    DEG(8,52,9) = 0
-    DEG(8,52,10) = 0
-    DEG(8,52,11) = 0
-    DEG(8,52,12) = 0
-  COEF(8,52) = (-0.31316937935965233, 0)
-    DEG(8,53,1) = 1
-    DEG(8,53,2) = 0
-    DEG(8,53,3) = 0
-    DEG(8,53,4) = 0
-    DEG(8,53,5) = 1
-    DEG(8,53,6) = 0
-    DEG(8,53,7) = 0
-    DEG(8,53,8) = 1
-    DEG(8,53,9) = 0
-    DEG(8,53,10) = 0
-    DEG(8,53,11) = 0
-    DEG(8,53,12) = 0
-  COEF(8,53) = (-0.7915615843824603, 0)
-    DEG(8,54,1) = 0
-    DEG(8,54,2) = 1
-    DEG(8,54,3) = 0
-    DEG(8,54,4) = 0
-    DEG(8,54,5) = 1
-    DEG(8,54,6) = 0
-    DEG(8,54,7) = 0
-    DEG(8,54,8) = 1
-    DEG(8,54,9) = 0
-    DEG(8,54,10) = 0
-    DEG(8,54,11) = 0
-    DEG(8,54,12) = 0
-  COEF(8,54) = (0.07318033082511774, 0)
-    DEG(8,55,1) = 0
-    DEG(8,55,2) = 0
-    DEG(8,55,3) = 1
-    DEG(8,55,4) = 0
-    DEG(8,55,5) = 1
-    DEG(8,55,6) = 0
-    DEG(8,55,7) = 0
-    DEG(8,55,8) = 1
-    DEG(8,55,9) = 0
-    DEG(8,55,10) = 0
-    DEG(8,55,11) = 0
-    DEG(8,55,12) = 0
-  COEF(8,55) = (-0.12657644295853399, 0)
-    DEG(8,56,1) = 0
-    DEG(8,56,2) = 0
-    DEG(8,56,3) = 0
-    DEG(8,56,4) = 1
-    DEG(8,56,5) = 1
-    DEG(8,56,6) = 0
-    DEG(8,56,7) = 0
-    DEG(8,56,8) = 1
-    DEG(8,56,9) = 0
-    DEG(8,56,10) = 0
-    DEG(8,56,11) = 0
-    DEG(8,56,12) = 0
-  COEF(8,56) = (0.7915615843824603, 0)
-    DEG(8,57,1) = 0
-    DEG(8,57,2) = 0
-    DEG(8,57,3) = 0
-    DEG(8,57,4) = 0
-    DEG(8,57,5) = 2
-    DEG(8,57,6) = 0
-    DEG(8,57,7) = 0
-    DEG(8,57,8) = 1
-    DEG(8,57,9) = 0
-    DEG(8,57,10) = 0
-    DEG(8,57,11) = 0
-    DEG(8,57,12) = 0
-  COEF(8,57) = (-0.03659016541255887, 0)
-    DEG(8,58,1) = 1
-    DEG(8,58,2) = 0
-    DEG(8,58,3) = 0
-    DEG(8,58,4) = 0
-    DEG(8,58,5) = 0
-    DEG(8,58,6) = 1
-    DEG(8,58,7) = 0
-    DEG(8,58,8) = 1
-    DEG(8,58,9) = 0
-    DEG(8,58,10) = 0
-    DEG(8,58,11) = 0
-    DEG(8,58,12) = 0
-  COEF(8,58) = (2.1446475318833795, 0)
-    DEG(8,59,1) = 0
-    DEG(8,59,2) = 1
-    DEG(8,59,3) = 0
-    DEG(8,59,4) = 0
-    DEG(8,59,5) = 0
-    DEG(8,59,6) = 1
-    DEG(8,59,7) = 0
-    DEG(8,59,8) = 1
-    DEG(8,59,9) = 0
-    DEG(8,59,10) = 0
-    DEG(8,59,11) = 0
-    DEG(8,59,12) = 0
-  COEF(8,59) = (-0.12657644295853399, 0)
-    DEG(8,60,1) = 0
-    DEG(8,60,2) = 0
-    DEG(8,60,3) = 1
-    DEG(8,60,4) = 0
-    DEG(8,60,5) = 0
-    DEG(8,60,6) = 1
-    DEG(8,60,7) = 0
-    DEG(8,60,8) = 1
-    DEG(8,60,9) = 0
-    DEG(8,60,10) = 0
-    DEG(8,60,11) = 0
-    DEG(8,60,12) = 0
-  COEF(8,60) = (0.2831403308894518, 0)
-    DEG(8,61,1) = 0
-    DEG(8,61,2) = 0
-    DEG(8,61,3) = 0
-    DEG(8,61,4) = 1
-    DEG(8,61,5) = 0
-    DEG(8,61,6) = 1
-    DEG(8,61,7) = 0
-    DEG(8,61,8) = 1
-    DEG(8,61,9) = 0
-    DEG(8,61,10) = 0
-    DEG(8,61,11) = 0
-    DEG(8,61,12) = 0
-  COEF(8,61) = (-2.1446475318833795, 0)
-    DEG(8,62,1) = 0
-    DEG(8,62,2) = 0
-    DEG(8,62,3) = 0
-    DEG(8,62,4) = 0
-    DEG(8,62,5) = 1
-    DEG(8,62,6) = 1
-    DEG(8,62,7) = 0
-    DEG(8,62,8) = 1
-    DEG(8,62,9) = 0
-    DEG(8,62,10) = 0
-    DEG(8,62,11) = 0
-    DEG(8,62,12) = 0
-  COEF(8,62) = (0.12657644295853399, 0)
-    DEG(8,63,1) = 0
-    DEG(8,63,2) = 0
-    DEG(8,63,3) = 0
-    DEG(8,63,4) = 0
-    DEG(8,63,5) = 0
-    DEG(8,63,6) = 2
-    DEG(8,63,7) = 0
-    DEG(8,63,8) = 1
-    DEG(8,63,9) = 0
-    DEG(8,63,10) = 0
-    DEG(8,63,11) = 0
-    DEG(8,63,12) = 0
-  COEF(8,63) = (-0.1415701654447259, 0)
-    DEG(8,64,1) = 1
-    DEG(8,64,2) = 0
-    DEG(8,64,3) = 0
-    DEG(8,64,4) = 1
-    DEG(8,64,5) = 0
-    DEG(8,64,6) = 0
-    DEG(8,64,7) = 1
-    DEG(8,64,8) = 1
-    DEG(8,64,9) = 0
-    DEG(8,64,10) = 0
-    DEG(8,64,11) = 0
-    DEG(8,64,12) = 0
-  COEF(8,64) = (-0.2255371164252022, 0)
-    DEG(8,65,1) = 0
-    DEG(8,65,2) = 1
-    DEG(8,65,3) = 0
-    DEG(8,65,4) = 1
-    DEG(8,65,5) = 0
-    DEG(8,65,6) = 0
-    DEG(8,65,7) = 1
-    DEG(8,65,8) = 1
-    DEG(8,65,9) = 0
-    DEG(8,65,10) = 0
-    DEG(8,65,11) = 0
-    DEG(8,65,12) = 0
-  COEF(8,65) = (-1.8128852231437191, 0)
-    DEG(8,66,1) = 0
-    DEG(8,66,2) = 0
-    DEG(8,66,3) = 1
-    DEG(8,66,4) = 1
-    DEG(8,66,5) = 0
-    DEG(8,66,6) = 0
-    DEG(8,66,7) = 1
-    DEG(8,66,8) = 1
-    DEG(8,66,9) = 0
-    DEG(8,66,10) = 0
-    DEG(8,66,11) = 0
-    DEG(8,66,12) = 0
-  COEF(8,66) = (1.2207066428938331, 0)
-    DEG(8,67,1) = 0
-    DEG(8,67,2) = 0
-    DEG(8,67,3) = 0
-    DEG(8,67,4) = 2
-    DEG(8,67,5) = 0
-    DEG(8,67,6) = 0
-    DEG(8,67,7) = 1
-    DEG(8,67,8) = 1
-    DEG(8,67,9) = 0
-    DEG(8,67,10) = 0
-    DEG(8,67,11) = 0
-    DEG(8,67,12) = 0
-  COEF(8,67) = (0.1127685582126011, 0)
-    DEG(8,68,1) = 1
-    DEG(8,68,2) = 0
-    DEG(8,68,3) = 0
-    DEG(8,68,4) = 0
-    DEG(8,68,5) = 1
-    DEG(8,68,6) = 0
-    DEG(8,68,7) = 1
-    DEG(8,68,8) = 1
-    DEG(8,68,9) = 0
-    DEG(8,68,10) = 0
-    DEG(8,68,11) = 0
-    DEG(8,68,12) = 0
-  COEF(8,68) = (-1.8128852231437191, 0)
-    DEG(8,69,1) = 0
-    DEG(8,69,2) = 1
-    DEG(8,69,3) = 0
-    DEG(8,69,4) = 0
-    DEG(8,69,5) = 1
-    DEG(8,69,6) = 0
-    DEG(8,69,7) = 1
-    DEG(8,69,8) = 1
-    DEG(8,69,9) = 0
-    DEG(8,69,10) = 0
-    DEG(8,69,11) = 0
-    DEG(8,69,12) = 0
-  COEF(8,69) = (0.14292652332106698, 0)
-    DEG(8,70,1) = 0
-    DEG(8,70,2) = 0
-    DEG(8,70,3) = 1
-    DEG(8,70,4) = 0
-    DEG(8,70,5) = 1
-    DEG(8,70,6) = 0
-    DEG(8,70,7) = 1
-    DEG(8,70,8) = 1
-    DEG(8,70,9) = 0
-    DEG(8,70,10) = 0
-    DEG(8,70,11) = 0
-    DEG(8,70,12) = 0
-  COEF(8,70) = (-0.38036150145696923, 0)
-    DEG(8,71,1) = 0
-    DEG(8,71,2) = 0
-    DEG(8,71,3) = 0
-    DEG(8,71,4) = 1
-    DEG(8,71,5) = 1
-    DEG(8,71,6) = 0
-    DEG(8,71,7) = 1
-    DEG(8,71,8) = 1
-    DEG(8,71,9) = 0
-    DEG(8,71,10) = 0
-    DEG(8,71,11) = 0
-    DEG(8,71,12) = 0
-  COEF(8,71) = (1.8128852231437191, 0)
-    DEG(8,72,1) = 0
-    DEG(8,72,2) = 0
-    DEG(8,72,3) = 0
-    DEG(8,72,4) = 0
-    DEG(8,72,5) = 2
-    DEG(8,72,6) = 0
-    DEG(8,72,7) = 1
-    DEG(8,72,8) = 1
-    DEG(8,72,9) = 0
-    DEG(8,72,10) = 0
-    DEG(8,72,11) = 0
-    DEG(8,72,12) = 0
-  COEF(8,72) = (-0.07146326166053349, 0)
-    DEG(8,73,1) = 1
-    DEG(8,73,2) = 0
-    DEG(8,73,3) = 0
-    DEG(8,73,4) = 0
-    DEG(8,73,5) = 0
-    DEG(8,73,6) = 1
-    DEG(8,73,7) = 1
-    DEG(8,73,8) = 1
-    DEG(8,73,9) = 0
-    DEG(8,73,10) = 0
-    DEG(8,73,11) = 0
-    DEG(8,73,12) = 0
-  COEF(8,73) = (1.2207066428938331, 0)
-    DEG(8,74,1) = 0
-    DEG(8,74,2) = 1
-    DEG(8,74,3) = 0
-    DEG(8,74,4) = 0
-    DEG(8,74,5) = 0
-    DEG(8,74,6) = 1
-    DEG(8,74,7) = 1
-    DEG(8,74,8) = 1
-    DEG(8,74,9) = 0
-    DEG(8,74,10) = 0
-    DEG(8,74,11) = 0
-    DEG(8,74,12) = 0
-  COEF(8,74) = (-0.38036150145696923, 0)
-    DEG(8,75,1) = 0
-    DEG(8,75,2) = 0
-    DEG(8,75,3) = 1
-    DEG(8,75,4) = 0
-    DEG(8,75,5) = 0
-    DEG(8,75,6) = 1
-    DEG(8,75,7) = 1
-    DEG(8,75,8) = 1
-    DEG(8,75,9) = 0
-    DEG(8,75,10) = 0
-    DEG(8,75,11) = 0
-    DEG(8,75,12) = 0
-  COEF(8,75) = (0.0826105931041352, 0)
-    DEG(8,76,1) = 0
-    DEG(8,76,2) = 0
-    DEG(8,76,3) = 0
-    DEG(8,76,4) = 1
-    DEG(8,76,5) = 0
-    DEG(8,76,6) = 1
-    DEG(8,76,7) = 1
-    DEG(8,76,8) = 1
-    DEG(8,76,9) = 0
-    DEG(8,76,10) = 0
-    DEG(8,76,11) = 0
-    DEG(8,76,12) = 0
-  COEF(8,76) = (-1.2207066428938331, 0)
-    DEG(8,77,1) = 0
-    DEG(8,77,2) = 0
-    DEG(8,77,3) = 0
-    DEG(8,77,4) = 0
-    DEG(8,77,5) = 1
-    DEG(8,77,6) = 1
-    DEG(8,77,7) = 1
-    DEG(8,77,8) = 1
-    DEG(8,77,9) = 0
-    DEG(8,77,10) = 0
-    DEG(8,77,11) = 0
-    DEG(8,77,12) = 0
-  COEF(8,77) = (0.38036150145696923, 0)
-    DEG(8,78,1) = 0
-    DEG(8,78,2) = 0
-    DEG(8,78,3) = 0
-    DEG(8,78,4) = 0
-    DEG(8,78,5) = 0
-    DEG(8,78,6) = 2
-    DEG(8,78,7) = 1
-    DEG(8,78,8) = 1
-    DEG(8,78,9) = 0
-    DEG(8,78,10) = 0
-    DEG(8,78,11) = 0
-    DEG(8,78,12) = 0
-  COEF(8,78) = (-0.0413052965520676, 0)
-    DEG(8,79,1) = 1
-    DEG(8,79,2) = 0
-    DEG(8,79,3) = 0
-    DEG(8,79,4) = 1
-    DEG(8,79,5) = 0
-    DEG(8,79,6) = 0
-    DEG(8,79,7) = 0
-    DEG(8,79,8) = 2
-    DEG(8,79,9) = 0
-    DEG(8,79,10) = 0
-    DEG(8,79,11) = 0
-    DEG(8,79,12) = 0
-  COEF(8,79) = (-1.0314429807982943, 0)
-    DEG(8,80,1) = 0
-    DEG(8,80,2) = 1
-    DEG(8,80,3) = 0
-    DEG(8,80,4) = 1
-    DEG(8,80,5) = 0
-    DEG(8,80,6) = 0
-    DEG(8,80,7) = 0
-    DEG(8,80,8) = 2
-    DEG(8,80,9) = 0
-    DEG(8,80,10) = 0
-    DEG(8,80,11) = 0
-    DEG(8,80,12) = 0
-  COEF(8,80) = (0.20889211311461095, 0)
-    DEG(8,81,1) = 0
-    DEG(8,81,2) = 0
-    DEG(8,81,3) = 1
-    DEG(8,81,4) = 1
-    DEG(8,81,5) = 0
-    DEG(8,81,6) = 0
-    DEG(8,81,7) = 0
-    DEG(8,81,8) = 2
-    DEG(8,81,9) = 0
-    DEG(8,81,10) = 0
-    DEG(8,81,11) = 0
-    DEG(8,81,12) = 0
-  COEF(8,81) = (-0.6398727443706175, 0)
-    DEG(8,82,1) = 0
-    DEG(8,82,2) = 0
-    DEG(8,82,3) = 0
-    DEG(8,82,4) = 2
-    DEG(8,82,5) = 0
-    DEG(8,82,6) = 0
-    DEG(8,82,7) = 0
-    DEG(8,82,8) = 2
-    DEG(8,82,9) = 0
-    DEG(8,82,10) = 0
-    DEG(8,82,11) = 0
-    DEG(8,82,12) = 0
-  COEF(8,82) = (0.5157214903991472, 0)
-    DEG(8,83,1) = 1
-    DEG(8,83,2) = 0
-    DEG(8,83,3) = 0
-    DEG(8,83,4) = 0
-    DEG(8,83,5) = 1
-    DEG(8,83,6) = 0
-    DEG(8,83,7) = 0
-    DEG(8,83,8) = 2
-    DEG(8,83,9) = 0
-    DEG(8,83,10) = 0
-    DEG(8,83,11) = 0
-    DEG(8,83,12) = 0
-  COEF(8,83) = (0.20889211311461095, 0)
-    DEG(8,84,1) = 0
-    DEG(8,84,2) = 1
-    DEG(8,84,3) = 0
-    DEG(8,84,4) = 0
-    DEG(8,84,5) = 1
-    DEG(8,84,6) = 0
-    DEG(8,84,7) = 0
-    DEG(8,84,8) = 2
-    DEG(8,84,9) = 0
-    DEG(8,84,10) = 0
-    DEG(8,84,11) = 0
-    DEG(8,84,12) = 0
-  COEF(8,84) = (0.19265088271037023, 0)
-    DEG(8,85,1) = 0
-    DEG(8,85,2) = 0
-    DEG(8,85,3) = 1
-    DEG(8,85,4) = 0
-    DEG(8,85,5) = 1
-    DEG(8,85,6) = 0
-    DEG(8,85,7) = 0
-    DEG(8,85,8) = 2
-    DEG(8,85,9) = 0
-    DEG(8,85,10) = 0
-    DEG(8,85,11) = 0
-    DEG(8,85,12) = 0
-  COEF(8,85) = (-0.4092489446089269, 0)
-    DEG(8,86,1) = 0
-    DEG(8,86,2) = 0
-    DEG(8,86,3) = 0
-    DEG(8,86,4) = 1
-    DEG(8,86,5) = 1
-    DEG(8,86,6) = 0
-    DEG(8,86,7) = 0
-    DEG(8,86,8) = 2
-    DEG(8,86,9) = 0
-    DEG(8,86,10) = 0
-    DEG(8,86,11) = 0
-    DEG(8,86,12) = 0
-  COEF(8,86) = (-0.20889211311461095, 0)
-    DEG(8,87,1) = 0
-    DEG(8,87,2) = 0
-    DEG(8,87,3) = 0
-    DEG(8,87,4) = 0
-    DEG(8,87,5) = 2
-    DEG(8,87,6) = 0
-    DEG(8,87,7) = 0
-    DEG(8,87,8) = 2
-    DEG(8,87,9) = 0
-    DEG(8,87,10) = 0
-    DEG(8,87,11) = 0
-    DEG(8,87,12) = 0
-  COEF(8,87) = (-0.09632544135518512, 0)
-    DEG(8,88,1) = 1
-    DEG(8,88,2) = 0
-    DEG(8,88,3) = 0
-    DEG(8,88,4) = 0
-    DEG(8,88,5) = 0
-    DEG(8,88,6) = 1
-    DEG(8,88,7) = 0
-    DEG(8,88,8) = 2
-    DEG(8,88,9) = 0
-    DEG(8,88,10) = 0
-    DEG(8,88,11) = 0
-    DEG(8,88,12) = 0
-  COEF(8,88) = (-0.6398727443706175, 0)
-    DEG(8,89,1) = 0
-    DEG(8,89,2) = 1
-    DEG(8,89,3) = 0
-    DEG(8,89,4) = 0
-    DEG(8,89,5) = 0
-    DEG(8,89,6) = 1
-    DEG(8,89,7) = 0
-    DEG(8,89,8) = 2
-    DEG(8,89,9) = 0
-    DEG(8,89,10) = 0
-    DEG(8,89,11) = 0
-    DEG(8,89,12) = 0
-  COEF(8,89) = (-0.4092489446089269, 0)
-    DEG(8,90,1) = 0
-    DEG(8,90,2) = 0
-    DEG(8,90,3) = 1
-    DEG(8,90,4) = 0
-    DEG(8,90,5) = 0
-    DEG(8,90,6) = 1
-    DEG(8,90,7) = 0
-    DEG(8,90,8) = 2
-    DEG(8,90,9) = 0
-    DEG(8,90,10) = 0
-    DEG(8,90,11) = 0
-    DEG(8,90,12) = 0
-  COEF(8,90) = (0.8387920980879241, 0)
-    DEG(8,91,1) = 0
-    DEG(8,91,2) = 0
-    DEG(8,91,3) = 0
-    DEG(8,91,4) = 1
-    DEG(8,91,5) = 0
-    DEG(8,91,6) = 1
-    DEG(8,91,7) = 0
-    DEG(8,91,8) = 2
-    DEG(8,91,9) = 0
-    DEG(8,91,10) = 0
-    DEG(8,91,11) = 0
-    DEG(8,91,12) = 0
-  COEF(8,91) = (0.6398727443706175, 0)
-    DEG(8,92,1) = 0
-    DEG(8,92,2) = 0
-    DEG(8,92,3) = 0
-    DEG(8,92,4) = 0
-    DEG(8,92,5) = 1
-    DEG(8,92,6) = 1
-    DEG(8,92,7) = 0
-    DEG(8,92,8) = 2
-    DEG(8,92,9) = 0
-    DEG(8,92,10) = 0
-    DEG(8,92,11) = 0
-    DEG(8,92,12) = 0
-  COEF(8,92) = (0.4092489446089269, 0)
-    DEG(8,93,1) = 0
-    DEG(8,93,2) = 0
-    DEG(8,93,3) = 0
-    DEG(8,93,4) = 0
-    DEG(8,93,5) = 0
-    DEG(8,93,6) = 2
-    DEG(8,93,7) = 0
-    DEG(8,93,8) = 2
-    DEG(8,93,9) = 0
-    DEG(8,93,10) = 0
-    DEG(8,93,11) = 0
-    DEG(8,93,12) = 0
-  COEF(8,93) = (-0.41939604904396205, 0)
-    DEG(8,94,1) = 0
-    DEG(8,94,2) = 0
-    DEG(8,94,3) = 0
-    DEG(8,94,4) = 0
-    DEG(8,94,5) = 0
-    DEG(8,94,6) = 0
-    DEG(8,94,7) = 0
-    DEG(8,94,8) = 0
-    DEG(8,94,9) = 1
-    DEG(8,94,10) = 0
-    DEG(8,94,11) = 0
-    DEG(8,94,12) = 0
-  COEF(8,94) = (-0.6295471921587168, 0)
-    DEG(8,95,1) = 1
-    DEG(8,95,2) = 0
-    DEG(8,95,3) = 0
-    DEG(8,95,4) = 1
-    DEG(8,95,5) = 0
-    DEG(8,95,6) = 0
-    DEG(8,95,7) = 0
-    DEG(8,95,8) = 0
-    DEG(8,95,9) = 1
-    DEG(8,95,10) = 0
-    DEG(8,95,11) = 0
-    DEG(8,95,12) = 0
-  COEF(8,95) = (1.759301752413052, 0)
-    DEG(8,96,1) = 0
-    DEG(8,96,2) = 1
-    DEG(8,96,3) = 0
-    DEG(8,96,4) = 1
-    DEG(8,96,5) = 0
-    DEG(8,96,6) = 0
-    DEG(8,96,7) = 0
-    DEG(8,96,8) = 0
-    DEG(8,96,9) = 1
-    DEG(8,96,10) = 0
-    DEG(8,96,11) = 0
-    DEG(8,96,12) = 0
-  COEF(8,96) = (-1.618261989221088, 0)
-    DEG(8,97,1) = 0
-    DEG(8,97,2) = 0
-    DEG(8,97,3) = 1
-    DEG(8,97,4) = 1
-    DEG(8,97,5) = 0
-    DEG(8,97,6) = 0
-    DEG(8,97,7) = 0
-    DEG(8,97,8) = 0
-    DEG(8,97,9) = 1
-    DEG(8,97,10) = 0
-    DEG(8,97,11) = 0
-    DEG(8,97,12) = 0
-  COEF(8,97) = (-0.5822050866126489, 0)
-    DEG(8,98,1) = 0
-    DEG(8,98,2) = 0
-    DEG(8,98,3) = 0
-    DEG(8,98,4) = 2
-    DEG(8,98,5) = 0
-    DEG(8,98,6) = 0
-    DEG(8,98,7) = 0
-    DEG(8,98,8) = 0
-    DEG(8,98,9) = 1
-    DEG(8,98,10) = 0
-    DEG(8,98,11) = 0
-    DEG(8,98,12) = 0
-  COEF(8,98) = (-0.879650876206526, 0)
-    DEG(8,99,1) = 1
-    DEG(8,99,2) = 0
-    DEG(8,99,3) = 0
-    DEG(8,99,4) = 0
-    DEG(8,99,5) = 1
-    DEG(8,99,6) = 0
-    DEG(8,99,7) = 0
-    DEG(8,99,8) = 0
-    DEG(8,99,9) = 1
-    DEG(8,99,10) = 0
-    DEG(8,99,11) = 0
-    DEG(8,99,12) = 0
-  COEF(8,99) = (-1.618261989221088, 0)
-    DEG(8,100,1) = 0
-    DEG(8,100,2) = 1
-    DEG(8,100,3) = 0
-    DEG(8,100,4) = 0
-    DEG(8,100,5) = 1
-    DEG(8,100,6) = 0
-    DEG(8,100,7) = 0
-    DEG(8,100,8) = 0
-    DEG(8,100,9) = 1
-    DEG(8,100,10) = 0
-    DEG(8,100,11) = 0
-    DEG(8,100,12) = 0
-  COEF(8,100) = (0.13443172783660934, 0)
-    DEG(8,101,1) = 0
-    DEG(8,101,2) = 0
-    DEG(8,101,3) = 1
-    DEG(8,101,4) = 0
-    DEG(8,101,5) = 1
-    DEG(8,101,6) = 0
-    DEG(8,101,7) = 0
-    DEG(8,101,8) = 0
-    DEG(8,101,9) = 1
-    DEG(8,101,10) = 0
-    DEG(8,101,11) = 0
-    DEG(8,101,12) = 0
-  COEF(8,101) = (0.14161426813728284, 0)
-    DEG(8,102,1) = 0
-    DEG(8,102,2) = 0
-    DEG(8,102,3) = 0
-    DEG(8,102,4) = 1
-    DEG(8,102,5) = 1
-    DEG(8,102,6) = 0
-    DEG(8,102,7) = 0
-    DEG(8,102,8) = 0
-    DEG(8,102,9) = 1
-    DEG(8,102,10) = 0
-    DEG(8,102,11) = 0
-    DEG(8,102,12) = 0
-  COEF(8,102) = (1.618261989221088, 0)
-    DEG(8,103,1) = 0
-    DEG(8,103,2) = 0
-    DEG(8,103,3) = 0
-    DEG(8,103,4) = 0
-    DEG(8,103,5) = 2
-    DEG(8,103,6) = 0
-    DEG(8,103,7) = 0
-    DEG(8,103,8) = 0
-    DEG(8,103,9) = 1
-    DEG(8,103,10) = 0
-    DEG(8,103,11) = 0
-    DEG(8,103,12) = 0
-  COEF(8,103) = (-0.06721586391830467, 0)
-    DEG(8,104,1) = 1
-    DEG(8,104,2) = 0
-    DEG(8,104,3) = 0
-    DEG(8,104,4) = 0
-    DEG(8,104,5) = 0
-    DEG(8,104,6) = 1
-    DEG(8,104,7) = 0
-    DEG(8,104,8) = 0
-    DEG(8,104,9) = 1
-    DEG(8,104,10) = 0
-    DEG(8,104,11) = 0
-    DEG(8,104,12) = 0
-  COEF(8,104) = (-0.5822050866126489, 0)
-    DEG(8,105,1) = 0
-    DEG(8,105,2) = 1
-    DEG(8,105,3) = 0
-    DEG(8,105,4) = 0
-    DEG(8,105,5) = 0
-    DEG(8,105,6) = 1
-    DEG(8,105,7) = 0
-    DEG(8,105,8) = 0
-    DEG(8,105,9) = 1
-    DEG(8,105,10) = 0
-    DEG(8,105,11) = 0
-    DEG(8,105,12) = 0
-  COEF(8,105) = (0.14161426813728284, 0)
-    DEG(8,106,1) = 0
-    DEG(8,106,2) = 0
-    DEG(8,106,3) = 1
-    DEG(8,106,4) = 0
-    DEG(8,106,5) = 0
-    DEG(8,106,6) = 1
-    DEG(8,106,7) = 0
-    DEG(8,106,8) = 0
-    DEG(8,106,9) = 1
-    DEG(8,106,10) = 0
-    DEG(8,106,11) = 0
-    DEG(8,106,12) = 0
-  COEF(8,106) = (-0.6346390959322279, 0)
-    DEG(8,107,1) = 0
-    DEG(8,107,2) = 0
-    DEG(8,107,3) = 0
-    DEG(8,107,4) = 1
-    DEG(8,107,5) = 0
-    DEG(8,107,6) = 1
-    DEG(8,107,7) = 0
-    DEG(8,107,8) = 0
-    DEG(8,107,9) = 1
-    DEG(8,107,10) = 0
-    DEG(8,107,11) = 0
-    DEG(8,107,12) = 0
-  COEF(8,107) = (0.5822050866126489, 0)
-    DEG(8,108,1) = 0
-    DEG(8,108,2) = 0
-    DEG(8,108,3) = 0
-    DEG(8,108,4) = 0
-    DEG(8,108,5) = 1
-    DEG(8,108,6) = 1
-    DEG(8,108,7) = 0
-    DEG(8,108,8) = 0
-    DEG(8,108,9) = 1
-    DEG(8,108,10) = 0
-    DEG(8,108,11) = 0
-    DEG(8,108,12) = 0
-  COEF(8,108) = (-0.14161426813728284, 0)
-    DEG(8,109,1) = 0
-    DEG(8,109,2) = 0
-    DEG(8,109,3) = 0
-    DEG(8,109,4) = 0
-    DEG(8,109,5) = 0
-    DEG(8,109,6) = 2
-    DEG(8,109,7) = 0
-    DEG(8,109,8) = 0
-    DEG(8,109,9) = 1
-    DEG(8,109,10) = 0
-    DEG(8,109,11) = 0
-    DEG(8,109,12) = 0
-  COEF(8,109) = (0.31731954796611395, 0)
-    DEG(8,110,1) = 1
-    DEG(8,110,2) = 0
-    DEG(8,110,3) = 0
-    DEG(8,110,4) = 1
-    DEG(8,110,5) = 0
-    DEG(8,110,6) = 0
-    DEG(8,110,7) = 1
-    DEG(8,110,8) = 0
-    DEG(8,110,9) = 1
-    DEG(8,110,10) = 0
-    DEG(8,110,11) = 0
-    DEG(8,110,12) = 0
-  COEF(8,110) = (0.902230641899685, 0)
-    DEG(8,111,1) = 0
-    DEG(8,111,2) = 1
-    DEG(8,111,3) = 0
-    DEG(8,111,4) = 1
-    DEG(8,111,5) = 0
-    DEG(8,111,6) = 0
-    DEG(8,111,7) = 1
-    DEG(8,111,8) = 0
-    DEG(8,111,9) = 1
-    DEG(8,111,10) = 0
-    DEG(8,111,11) = 0
-    DEG(8,111,12) = 0
-  COEF(8,111) = (-2.069918619889183, 0)
-    DEG(8,112,1) = 0
-    DEG(8,112,2) = 0
-    DEG(8,112,3) = 1
-    DEG(8,112,4) = 1
-    DEG(8,112,5) = 0
-    DEG(8,112,6) = 0
-    DEG(8,112,7) = 1
-    DEG(8,112,8) = 0
-    DEG(8,112,9) = 1
-    DEG(8,112,10) = 0
-    DEG(8,112,11) = 0
-    DEG(8,112,12) = 0
-  COEF(8,112) = (-0.30856741466079163, 0)
-    DEG(8,113,1) = 0
-    DEG(8,113,2) = 0
-    DEG(8,113,3) = 0
-    DEG(8,113,4) = 2
-    DEG(8,113,5) = 0
-    DEG(8,113,6) = 0
-    DEG(8,113,7) = 1
-    DEG(8,113,8) = 0
-    DEG(8,113,9) = 1
-    DEG(8,113,10) = 0
-    DEG(8,113,11) = 0
-    DEG(8,113,12) = 0
-  COEF(8,113) = (-0.4511153209498425, 0)
-    DEG(8,114,1) = 1
-    DEG(8,114,2) = 0
-    DEG(8,114,3) = 0
-    DEG(8,114,4) = 0
-    DEG(8,114,5) = 1
-    DEG(8,114,6) = 0
-    DEG(8,114,7) = 1
-    DEG(8,114,8) = 0
-    DEG(8,114,9) = 1
-    DEG(8,114,10) = 0
-    DEG(8,114,11) = 0
-    DEG(8,114,12) = 0
-  COEF(8,114) = (-2.069918619889183, 0)
-    DEG(8,115,1) = 0
-    DEG(8,115,2) = 1
-    DEG(8,115,3) = 0
-    DEG(8,115,4) = 0
-    DEG(8,115,5) = 1
-    DEG(8,115,6) = 0
-    DEG(8,115,7) = 1
-    DEG(8,115,8) = 0
-    DEG(8,115,9) = 1
-    DEG(8,115,10) = 0
-    DEG(8,115,11) = 0
-    DEG(8,115,12) = 0
-  COEF(8,115) = (-0.9191338349070634, 0)
-    DEG(8,116,1) = 0
-    DEG(8,116,2) = 0
-    DEG(8,116,3) = 1
-    DEG(8,116,4) = 0
-    DEG(8,116,5) = 1
-    DEG(8,116,6) = 0
-    DEG(8,116,7) = 1
-    DEG(8,116,8) = 0
-    DEG(8,116,9) = 1
-    DEG(8,116,10) = 0
-    DEG(8,116,11) = 0
-    DEG(8,116,12) = 0
-  COEF(8,116) = (1.0269316148047434, 0)
-    DEG(8,117,1) = 0
-    DEG(8,117,2) = 0
-    DEG(8,117,3) = 0
-    DEG(8,117,4) = 1
-    DEG(8,117,5) = 1
-    DEG(8,117,6) = 0
-    DEG(8,117,7) = 1
-    DEG(8,117,8) = 0
-    DEG(8,117,9) = 1
-    DEG(8,117,10) = 0
-    DEG(8,117,11) = 0
-    DEG(8,117,12) = 0
-  COEF(8,117) = (2.069918619889183, 0)
-    DEG(8,118,1) = 0
-    DEG(8,118,2) = 0
-    DEG(8,118,3) = 0
-    DEG(8,118,4) = 0
-    DEG(8,118,5) = 2
-    DEG(8,118,6) = 0
-    DEG(8,118,7) = 1
-    DEG(8,118,8) = 0
-    DEG(8,118,9) = 1
-    DEG(8,118,10) = 0
-    DEG(8,118,11) = 0
-    DEG(8,118,12) = 0
-  COEF(8,118) = (0.4595669174535317, 0)
-    DEG(8,119,1) = 1
-    DEG(8,119,2) = 0
-    DEG(8,119,3) = 0
-    DEG(8,119,4) = 0
-    DEG(8,119,5) = 0
-    DEG(8,119,6) = 1
-    DEG(8,119,7) = 1
-    DEG(8,119,8) = 0
-    DEG(8,119,9) = 1
-    DEG(8,119,10) = 0
-    DEG(8,119,11) = 0
-    DEG(8,119,12) = 0
-  COEF(8,119) = (-0.30856741466079163, 0)
-    DEG(8,120,1) = 0
-    DEG(8,120,2) = 1
-    DEG(8,120,3) = 0
-    DEG(8,120,4) = 0
-    DEG(8,120,5) = 0
-    DEG(8,120,6) = 1
-    DEG(8,120,7) = 1
-    DEG(8,120,8) = 0
-    DEG(8,120,9) = 1
-    DEG(8,120,10) = 0
-    DEG(8,120,11) = 0
-    DEG(8,120,12) = 0
-  COEF(8,120) = (1.0269316148047434, 0)
-    DEG(8,121,1) = 0
-    DEG(8,121,2) = 0
-    DEG(8,121,3) = 1
-    DEG(8,121,4) = 0
-    DEG(8,121,5) = 0
-    DEG(8,121,6) = 1
-    DEG(8,121,7) = 1
-    DEG(8,121,8) = 0
-    DEG(8,121,9) = 1
-    DEG(8,121,10) = 0
-    DEG(8,121,11) = 0
-    DEG(8,121,12) = 0
-  COEF(8,121) = (0.01690319300737837, 0)
-    DEG(8,122,1) = 0
-    DEG(8,122,2) = 0
-    DEG(8,122,3) = 0
-    DEG(8,122,4) = 1
-    DEG(8,122,5) = 0
-    DEG(8,122,6) = 1
-    DEG(8,122,7) = 1
-    DEG(8,122,8) = 0
-    DEG(8,122,9) = 1
-    DEG(8,122,10) = 0
-    DEG(8,122,11) = 0
-    DEG(8,122,12) = 0
-  COEF(8,122) = (0.30856741466079163, 0)
-    DEG(8,123,1) = 0
-    DEG(8,123,2) = 0
-    DEG(8,123,3) = 0
-    DEG(8,123,4) = 0
-    DEG(8,123,5) = 1
-    DEG(8,123,6) = 1
-    DEG(8,123,7) = 1
-    DEG(8,123,8) = 0
-    DEG(8,123,9) = 1
-    DEG(8,123,10) = 0
-    DEG(8,123,11) = 0
-    DEG(8,123,12) = 0
-  COEF(8,123) = (-1.0269316148047434, 0)
-    DEG(8,124,1) = 0
-    DEG(8,124,2) = 0
-    DEG(8,124,3) = 0
-    DEG(8,124,4) = 0
-    DEG(8,124,5) = 0
-    DEG(8,124,6) = 2
-    DEG(8,124,7) = 1
-    DEG(8,124,8) = 0
-    DEG(8,124,9) = 1
-    DEG(8,124,10) = 0
-    DEG(8,124,11) = 0
-    DEG(8,124,12) = 0
-  COEF(8,124) = (-0.008451596503689185, 0)
-    DEG(8,125,1) = 1
-    DEG(8,125,2) = 0
-    DEG(8,125,3) = 0
-    DEG(8,125,4) = 1
-    DEG(8,125,5) = 0
-    DEG(8,125,6) = 0
-    DEG(8,125,7) = 0
-    DEG(8,125,8) = 1
-    DEG(8,125,9) = 1
-    DEG(8,125,10) = 0
-    DEG(8,125,11) = 0
-    DEG(8,125,12) = 0
-  COEF(8,125) = (-1.5290920716790801, 0)
-    DEG(8,126,1) = 0
-    DEG(8,126,2) = 1
-    DEG(8,126,3) = 0
-    DEG(8,126,4) = 1
-    DEG(8,126,5) = 0
-    DEG(8,126,6) = 0
-    DEG(8,126,7) = 0
-    DEG(8,126,8) = 1
-    DEG(8,126,9) = 1
-    DEG(8,126,10) = 0
-    DEG(8,126,11) = 0
-    DEG(8,126,12) = 0
-  COEF(8,126) = (-0.0988988440661481, 0)
-    DEG(8,127,1) = 0
-    DEG(8,127,2) = 0
-    DEG(8,127,3) = 1
-    DEG(8,127,4) = 1
-    DEG(8,127,5) = 0
-    DEG(8,127,6) = 0
-    DEG(8,127,7) = 0
-    DEG(8,127,8) = 1
-    DEG(8,127,9) = 1
-    DEG(8,127,10) = 0
-    DEG(8,127,11) = 0
-    DEG(8,127,12) = 0
-  COEF(8,127) = (1.0252446763020444, 0)
-    DEG(8,128,1) = 0
-    DEG(8,128,2) = 0
-    DEG(8,128,3) = 0
-    DEG(8,128,4) = 2
-    DEG(8,128,5) = 0
-    DEG(8,128,6) = 0
-    DEG(8,128,7) = 0
-    DEG(8,128,8) = 1
-    DEG(8,128,9) = 1
-    DEG(8,128,10) = 0
-    DEG(8,128,11) = 0
-    DEG(8,128,12) = 0
-  COEF(8,128) = (0.7645460358395401, 0)
-    DEG(8,129,1) = 1
-    DEG(8,129,2) = 0
-    DEG(8,129,3) = 0
-    DEG(8,129,4) = 0
-    DEG(8,129,5) = 1
-    DEG(8,129,6) = 0
-    DEG(8,129,7) = 0
-    DEG(8,129,8) = 1
-    DEG(8,129,9) = 1
-    DEG(8,129,10) = 0
-    DEG(8,129,11) = 0
-    DEG(8,129,12) = 0
-  COEF(8,129) = (-0.0988988440661481, 0)
-    DEG(8,130,1) = 0
-    DEG(8,130,2) = 1
-    DEG(8,130,3) = 0
-    DEG(8,130,4) = 0
-    DEG(8,130,5) = 1
-    DEG(8,130,6) = 0
-    DEG(8,130,7) = 0
-    DEG(8,130,8) = 1
-    DEG(8,130,9) = 1
-    DEG(8,130,10) = 0
-    DEG(8,130,11) = 0
-    DEG(8,130,12) = 0
-  COEF(8,130) = (1.0787223763767115, 0)
-    DEG(8,131,1) = 0
-    DEG(8,131,2) = 0
-    DEG(8,131,3) = 1
-    DEG(8,131,4) = 0
-    DEG(8,131,5) = 1
-    DEG(8,131,6) = 0
-    DEG(8,131,7) = 0
-    DEG(8,131,8) = 1
-    DEG(8,131,9) = 1
-    DEG(8,131,10) = 0
-    DEG(8,131,11) = 0
-    DEG(8,131,12) = 0
-  COEF(8,131) = (-1.2727537708086927, 0)
-    DEG(8,132,1) = 0
-    DEG(8,132,2) = 0
-    DEG(8,132,3) = 0
-    DEG(8,132,4) = 1
-    DEG(8,132,5) = 1
-    DEG(8,132,6) = 0
-    DEG(8,132,7) = 0
-    DEG(8,132,8) = 1
-    DEG(8,132,9) = 1
-    DEG(8,132,10) = 0
-    DEG(8,132,11) = 0
-    DEG(8,132,12) = 0
-  COEF(8,132) = (0.0988988440661481, 0)
-    DEG(8,133,1) = 0
-    DEG(8,133,2) = 0
-    DEG(8,133,3) = 0
-    DEG(8,133,4) = 0
-    DEG(8,133,5) = 2
-    DEG(8,133,6) = 0
-    DEG(8,133,7) = 0
-    DEG(8,133,8) = 1
-    DEG(8,133,9) = 1
-    DEG(8,133,10) = 0
-    DEG(8,133,11) = 0
-    DEG(8,133,12) = 0
-  COEF(8,133) = (-0.5393611881883558, 0)
-    DEG(8,134,1) = 1
-    DEG(8,134,2) = 0
-    DEG(8,134,3) = 0
-    DEG(8,134,4) = 0
-    DEG(8,134,5) = 0
-    DEG(8,134,6) = 1
-    DEG(8,134,7) = 0
-    DEG(8,134,8) = 1
-    DEG(8,134,9) = 1
-    DEG(8,134,10) = 0
-    DEG(8,134,11) = 0
-    DEG(8,134,12) = 0
-  COEF(8,134) = (1.0252446763020444, 0)
-    DEG(8,135,1) = 0
-    DEG(8,135,2) = 1
-    DEG(8,135,3) = 0
-    DEG(8,135,4) = 0
-    DEG(8,135,5) = 0
-    DEG(8,135,6) = 1
-    DEG(8,135,7) = 0
-    DEG(8,135,8) = 1
-    DEG(8,135,9) = 1
-    DEG(8,135,10) = 0
-    DEG(8,135,11) = 0
-    DEG(8,135,12) = 0
-  COEF(8,135) = (-1.2727537708086927, 0)
-    DEG(8,136,1) = 0
-    DEG(8,136,2) = 0
-    DEG(8,136,3) = 1
-    DEG(8,136,4) = 0
-    DEG(8,136,5) = 0
-    DEG(8,136,6) = 1
-    DEG(8,136,7) = 0
-    DEG(8,136,8) = 1
-    DEG(8,136,9) = 1
-    DEG(8,136,10) = 0
-    DEG(8,136,11) = 0
-    DEG(8,136,12) = 0
-  COEF(8,136) = (0.4503696953023687, 0)
-    DEG(8,137,1) = 0
-    DEG(8,137,2) = 0
-    DEG(8,137,3) = 0
-    DEG(8,137,4) = 1
-    DEG(8,137,5) = 0
-    DEG(8,137,6) = 1
-    DEG(8,137,7) = 0
-    DEG(8,137,8) = 1
-    DEG(8,137,9) = 1
-    DEG(8,137,10) = 0
-    DEG(8,137,11) = 0
-    DEG(8,137,12) = 0
-  COEF(8,137) = (-1.0252446763020444, 0)
-    DEG(8,138,1) = 0
-    DEG(8,138,2) = 0
-    DEG(8,138,3) = 0
-    DEG(8,138,4) = 0
-    DEG(8,138,5) = 1
-    DEG(8,138,6) = 1
-    DEG(8,138,7) = 0
-    DEG(8,138,8) = 1
-    DEG(8,138,9) = 1
-    DEG(8,138,10) = 0
-    DEG(8,138,11) = 0
-    DEG(8,138,12) = 0
-  COEF(8,138) = (1.2727537708086927, 0)
-    DEG(8,139,1) = 0
-    DEG(8,139,2) = 0
-    DEG(8,139,3) = 0
-    DEG(8,139,4) = 0
-    DEG(8,139,5) = 0
-    DEG(8,139,6) = 2
-    DEG(8,139,7) = 0
-    DEG(8,139,8) = 1
-    DEG(8,139,9) = 1
-    DEG(8,139,10) = 0
-    DEG(8,139,11) = 0
-    DEG(8,139,12) = 0
-  COEF(8,139) = (-0.22518484765118435, 0)
-    DEG(8,140,1) = 1
-    DEG(8,140,2) = 0
-    DEG(8,140,3) = 0
-    DEG(8,140,4) = 1
-    DEG(8,140,5) = 0
-    DEG(8,140,6) = 0
-    DEG(8,140,7) = 0
-    DEG(8,140,8) = 0
-    DEG(8,140,9) = 2
-    DEG(8,140,10) = 0
-    DEG(8,140,11) = 0
-    DEG(8,140,12) = 0
-  COEF(8,140) = (-0.3635546182907525, 0)
-    DEG(8,141,1) = 0
-    DEG(8,141,2) = 1
-    DEG(8,141,3) = 0
-    DEG(8,141,4) = 1
-    DEG(8,141,5) = 0
-    DEG(8,141,6) = 0
-    DEG(8,141,7) = 0
-    DEG(8,141,8) = 0
-    DEG(8,141,9) = 2
-    DEG(8,141,10) = 0
-    DEG(8,141,11) = 0
-    DEG(8,141,12) = 0
-  COEF(8,141) = (-0.5210308223247208, 0)
-    DEG(8,142,1) = 0
-    DEG(8,142,2) = 0
-    DEG(8,142,3) = 1
-    DEG(8,142,4) = 1
-    DEG(8,142,5) = 0
-    DEG(8,142,6) = 0
-    DEG(8,142,7) = 0
-    DEG(8,142,8) = 0
-    DEG(8,142,9) = 2
-    DEG(8,142,10) = 0
-    DEG(8,142,11) = 0
-    DEG(8,142,12) = 0
-  COEF(8,142) = (0.5802702614330235, 0)
-    DEG(8,143,1) = 0
-    DEG(8,143,2) = 0
-    DEG(8,143,3) = 0
-    DEG(8,143,4) = 2
-    DEG(8,143,5) = 0
-    DEG(8,143,6) = 0
-    DEG(8,143,7) = 0
-    DEG(8,143,8) = 0
-    DEG(8,143,9) = 2
-    DEG(8,143,10) = 0
-    DEG(8,143,11) = 0
-    DEG(8,143,12) = 0
-  COEF(8,143) = (0.18177730914537624, 0)
-    DEG(8,144,1) = 1
-    DEG(8,144,2) = 0
-    DEG(8,144,3) = 0
-    DEG(8,144,4) = 0
-    DEG(8,144,5) = 1
-    DEG(8,144,6) = 0
-    DEG(8,144,7) = 0
-    DEG(8,144,8) = 0
-    DEG(8,144,9) = 2
-    DEG(8,144,10) = 0
-    DEG(8,144,11) = 0
-    DEG(8,144,12) = 0
-  COEF(8,144) = (-0.5210308223247208, 0)
-    DEG(8,145,1) = 0
-    DEG(8,145,2) = 1
-    DEG(8,145,3) = 0
-    DEG(8,145,4) = 0
-    DEG(8,145,5) = 1
-    DEG(8,145,6) = 0
-    DEG(8,145,7) = 0
-    DEG(8,145,8) = 0
-    DEG(8,145,9) = 2
-    DEG(8,145,10) = 0
-    DEG(8,145,11) = 0
-    DEG(8,145,12) = 0
-  COEF(8,145) = (1.2043730278683396, 0)
-    DEG(8,146,1) = 0
-    DEG(8,146,2) = 0
-    DEG(8,146,3) = 1
-    DEG(8,146,4) = 0
-    DEG(8,146,5) = 1
-    DEG(8,146,6) = 0
-    DEG(8,146,7) = 0
-    DEG(8,146,8) = 0
-    DEG(8,146,9) = 2
-    DEG(8,146,10) = 0
-    DEG(8,146,11) = 0
-    DEG(8,146,12) = 0
-  COEF(8,146) = (0.4235376570179526, 0)
-    DEG(8,147,1) = 0
-    DEG(8,147,2) = 0
-    DEG(8,147,3) = 0
-    DEG(8,147,4) = 1
-    DEG(8,147,5) = 1
-    DEG(8,147,6) = 0
-    DEG(8,147,7) = 0
-    DEG(8,147,8) = 0
-    DEG(8,147,9) = 2
-    DEG(8,147,10) = 0
-    DEG(8,147,11) = 0
-    DEG(8,147,12) = 0
-  COEF(8,147) = (0.5210308223247208, 0)
-    DEG(8,148,1) = 0
-    DEG(8,148,2) = 0
-    DEG(8,148,3) = 0
-    DEG(8,148,4) = 0
-    DEG(8,148,5) = 2
-    DEG(8,148,6) = 0
-    DEG(8,148,7) = 0
-    DEG(8,148,8) = 0
-    DEG(8,148,9) = 2
-    DEG(8,148,10) = 0
-    DEG(8,148,11) = 0
-    DEG(8,148,12) = 0
-  COEF(8,148) = (-0.6021865139341698, 0)
-    DEG(8,149,1) = 1
-    DEG(8,149,2) = 0
-    DEG(8,149,3) = 0
-    DEG(8,149,4) = 0
-    DEG(8,149,5) = 0
-    DEG(8,149,6) = 1
-    DEG(8,149,7) = 0
-    DEG(8,149,8) = 0
-    DEG(8,149,9) = 2
-    DEG(8,149,10) = 0
-    DEG(8,149,11) = 0
-    DEG(8,149,12) = 0
-  COEF(8,149) = (0.5802702614330235, 0)
-    DEG(8,150,1) = 0
-    DEG(8,150,2) = 1
-    DEG(8,150,3) = 0
-    DEG(8,150,4) = 0
-    DEG(8,150,5) = 0
-    DEG(8,150,6) = 1
-    DEG(8,150,7) = 0
-    DEG(8,150,8) = 0
-    DEG(8,150,9) = 2
-    DEG(8,150,10) = 0
-    DEG(8,150,11) = 0
-    DEG(8,150,12) = 0
-  COEF(8,150) = (0.4235376570179526, 0)
-    DEG(8,151,1) = 0
-    DEG(8,151,2) = 0
-    DEG(8,151,3) = 1
-    DEG(8,151,4) = 0
-    DEG(8,151,5) = 0
-    DEG(8,151,6) = 1
-    DEG(8,151,7) = 0
-    DEG(8,151,8) = 0
-    DEG(8,151,9) = 2
-    DEG(8,151,10) = 0
-    DEG(8,151,11) = 0
-    DEG(8,151,12) = 0
-  COEF(8,151) = (-0.840818409577587, 0)
-    DEG(8,152,1) = 0
-    DEG(8,152,2) = 0
-    DEG(8,152,3) = 0
-    DEG(8,152,4) = 1
-    DEG(8,152,5) = 0
-    DEG(8,152,6) = 1
-    DEG(8,152,7) = 0
-    DEG(8,152,8) = 0
-    DEG(8,152,9) = 2
-    DEG(8,152,10) = 0
-    DEG(8,152,11) = 0
-    DEG(8,152,12) = 0
-  COEF(8,152) = (-0.5802702614330235, 0)
-    DEG(8,153,1) = 0
-    DEG(8,153,2) = 0
-    DEG(8,153,3) = 0
-    DEG(8,153,4) = 0
-    DEG(8,153,5) = 1
-    DEG(8,153,6) = 1
-    DEG(8,153,7) = 0
-    DEG(8,153,8) = 0
-    DEG(8,153,9) = 2
-    DEG(8,153,10) = 0
-    DEG(8,153,11) = 0
-    DEG(8,153,12) = 0
-  COEF(8,153) = (-0.4235376570179526, 0)
-    DEG(8,154,1) = 0
-    DEG(8,154,2) = 0
-    DEG(8,154,3) = 0
-    DEG(8,154,4) = 0
-    DEG(8,154,5) = 0
-    DEG(8,154,6) = 2
-    DEG(8,154,7) = 0
-    DEG(8,154,8) = 0
-    DEG(8,154,9) = 2
-    DEG(8,154,10) = 0
-    DEG(8,154,11) = 0
-    DEG(8,154,12) = 0
-  COEF(8,154) = (0.4204092047887935, 0)
-    DEG(8,155,1) = 0
-    DEG(8,155,2) = 0
-    DEG(8,155,3) = 0
-    DEG(8,155,4) = 0
-    DEG(8,155,5) = 0
-    DEG(8,155,6) = 0
-    DEG(8,155,7) = 0
-    DEG(8,155,8) = 0
-    DEG(8,155,9) = 0
-    DEG(8,155,10) = 1
-    DEG(8,155,11) = 0
-    DEG(8,155,12) = 0
-  COEF(8,155) = (-1.9670576798090837, 0)
-    DEG(8,156,1) = 1
-    DEG(8,156,2) = 0
-    DEG(8,156,3) = 0
-    DEG(8,156,4) = 1
-    DEG(8,156,5) = 0
-    DEG(8,156,6) = 0
-    DEG(8,156,7) = 0
-    DEG(8,156,8) = 0
-    DEG(8,156,9) = 0
-    DEG(8,156,10) = 1
-    DEG(8,156,11) = 0
-    DEG(8,156,12) = 0
-  COEF(8,156) = (1.9670576798090837, 0)
-    DEG(8,157,1) = 1
-    DEG(8,157,2) = 0
-    DEG(8,157,3) = 0
-    DEG(8,157,4) = 0
-    DEG(8,157,5) = 1
-    DEG(8,157,6) = 0
-    DEG(8,157,7) = 0
-    DEG(8,157,8) = 0
-    DEG(8,157,9) = 0
-    DEG(8,157,10) = 1
-    DEG(8,157,11) = 0
-    DEG(8,157,12) = 0
-  COEF(8,157) = (-0.1054039245983641, 0)
-    DEG(8,158,1) = 1
-    DEG(8,158,2) = 0
-    DEG(8,158,3) = 0
-    DEG(8,158,4) = 0
-    DEG(8,158,5) = 0
-    DEG(8,158,6) = 1
-    DEG(8,158,7) = 0
-    DEG(8,158,8) = 0
-    DEG(8,158,9) = 0
-    DEG(8,158,10) = 1
-    DEG(8,158,11) = 0
-    DEG(8,158,12) = 0
-  COEF(8,158) = (0.3134939004480767, 0)
-    DEG(8,159,1) = 0
-    DEG(8,159,2) = 0
-    DEG(8,159,3) = 0
-    DEG(8,159,4) = 0
-    DEG(8,159,5) = 0
-    DEG(8,159,6) = 0
-    DEG(8,159,7) = 1
-    DEG(8,159,8) = 0
-    DEG(8,159,9) = 0
-    DEG(8,159,10) = 1
-    DEG(8,159,11) = 0
-    DEG(8,159,12) = 0
-  COEF(8,159) = (-1.212132798533325, 0)
-    DEG(8,160,1) = 1
-    DEG(8,160,2) = 0
-    DEG(8,160,3) = 0
-    DEG(8,160,4) = 1
-    DEG(8,160,5) = 0
-    DEG(8,160,6) = 0
-    DEG(8,160,7) = 1
-    DEG(8,160,8) = 0
-    DEG(8,160,9) = 0
-    DEG(8,160,10) = 1
-    DEG(8,160,11) = 0
-    DEG(8,160,12) = 0
-  COEF(8,160) = (1.212132798533325, 0)
-    DEG(8,161,1) = 1
-    DEG(8,161,2) = 0
-    DEG(8,161,3) = 0
-    DEG(8,161,4) = 0
-    DEG(8,161,5) = 1
-    DEG(8,161,6) = 0
-    DEG(8,161,7) = 1
-    DEG(8,161,8) = 0
-    DEG(8,161,9) = 0
-    DEG(8,161,10) = 1
-    DEG(8,161,11) = 0
-    DEG(8,161,12) = 0
-  COEF(8,161) = (-0.9717430606808847, 0)
-    DEG(8,162,1) = 1
-    DEG(8,162,2) = 0
-    DEG(8,162,3) = 0
-    DEG(8,162,4) = 0
-    DEG(8,162,5) = 0
-    DEG(8,162,6) = 1
-    DEG(8,162,7) = 1
-    DEG(8,162,8) = 0
-    DEG(8,162,9) = 0
-    DEG(8,162,10) = 1
-    DEG(8,162,11) = 0
-    DEG(8,162,12) = 0
-  COEF(8,162) = (0.02838100287479828, 0)
-    DEG(8,163,1) = 0
-    DEG(8,163,2) = 0
-    DEG(8,163,3) = 0
-    DEG(8,163,4) = 0
-    DEG(8,163,5) = 0
-    DEG(8,163,6) = 0
-    DEG(8,163,7) = 0
-    DEG(8,163,8) = 1
-    DEG(8,163,9) = 0
-    DEG(8,163,10) = 1
-    DEG(8,163,11) = 0
-    DEG(8,163,12) = 0
-  COEF(8,163) = (1.144865957817944, 0)
-    DEG(8,164,1) = 1
-    DEG(8,164,2) = 0
-    DEG(8,164,3) = 0
-    DEG(8,164,4) = 1
-    DEG(8,164,5) = 0
-    DEG(8,164,6) = 0
-    DEG(8,164,7) = 0
-    DEG(8,164,8) = 1
-    DEG(8,164,9) = 0
-    DEG(8,164,10) = 1
-    DEG(8,164,11) = 0
-    DEG(8,164,12) = 0
-  COEF(8,164) = (-1.144865957817944, 0)
-    DEG(8,165,1) = 1
-    DEG(8,165,2) = 0
-    DEG(8,165,3) = 0
-    DEG(8,165,4) = 0
-    DEG(8,165,5) = 1
-    DEG(8,165,6) = 0
-    DEG(8,165,7) = 0
-    DEG(8,165,8) = 1
-    DEG(8,165,9) = 0
-    DEG(8,165,10) = 1
-    DEG(8,165,11) = 0
-    DEG(8,165,12) = 0
-  COEF(8,165) = (-0.31455604998454945, 0)
-    DEG(8,166,1) = 1
-    DEG(8,166,2) = 0
-    DEG(8,166,3) = 0
-    DEG(8,166,4) = 0
-    DEG(8,166,5) = 0
-    DEG(8,166,6) = 1
-    DEG(8,166,7) = 0
-    DEG(8,166,8) = 1
-    DEG(8,166,9) = 0
-    DEG(8,166,10) = 1
-    DEG(8,166,11) = 0
-    DEG(8,166,12) = 0
-  COEF(8,166) = (0.5428957927935338, 0)
-    DEG(8,167,1) = 0
-    DEG(8,167,2) = 0
-    DEG(8,167,3) = 0
-    DEG(8,167,4) = 0
-    DEG(8,167,5) = 0
-    DEG(8,167,6) = 0
-    DEG(8,167,7) = 0
-    DEG(8,167,8) = 0
-    DEG(8,167,9) = 1
-    DEG(8,167,10) = 1
-    DEG(8,167,11) = 0
-    DEG(8,167,12) = 0
-  COEF(8,167) = (0.340521182301978, 0)
-    DEG(8,168,1) = 1
-    DEG(8,168,2) = 0
-    DEG(8,168,3) = 0
-    DEG(8,168,4) = 1
-    DEG(8,168,5) = 0
-    DEG(8,168,6) = 0
-    DEG(8,168,7) = 0
-    DEG(8,168,8) = 0
-    DEG(8,168,9) = 1
-    DEG(8,168,10) = 1
-    DEG(8,168,11) = 0
-    DEG(8,168,12) = 0
-  COEF(8,168) = (-0.340521182301978, 0)
-    DEG(8,169,1) = 1
-    DEG(8,169,2) = 0
-    DEG(8,169,3) = 0
-    DEG(8,169,4) = 0
-    DEG(8,169,5) = 1
-    DEG(8,169,6) = 0
-    DEG(8,169,7) = 0
-    DEG(8,169,8) = 0
-    DEG(8,169,9) = 1
-    DEG(8,169,10) = 1
-    DEG(8,169,11) = 0
-    DEG(8,169,12) = 0
-  COEF(8,169) = (-1.2768770869276158, 0)
-    DEG(8,170,1) = 1
-    DEG(8,170,2) = 0
-    DEG(8,170,3) = 0
-    DEG(8,170,4) = 0
-    DEG(8,170,5) = 0
-    DEG(8,170,6) = 1
-    DEG(8,170,7) = 0
-    DEG(8,170,8) = 0
-    DEG(8,170,9) = 1
-    DEG(8,170,10) = 1
-    DEG(8,170,11) = 0
-    DEG(8,170,12) = 0
-  COEF(8,170) = (0.7084999114166955, 0)
-    DEG(8,171,1) = 0
-    DEG(8,171,2) = 0
-    DEG(8,171,3) = 0
-    DEG(8,171,4) = 0
-    DEG(8,171,5) = 0
-    DEG(8,171,6) = 0
-    DEG(8,171,7) = 0
-    DEG(8,171,8) = 0
-    DEG(8,171,9) = 0
-    DEG(8,171,10) = 0
-    DEG(8,171,11) = 1
-    DEG(8,171,12) = 0
-  COEF(8,171) = (0.1054039245983641, 0)
-    DEG(8,172,1) = 0
-    DEG(8,172,2) = 1
-    DEG(8,172,3) = 0
-    DEG(8,172,4) = 1
-    DEG(8,172,5) = 0
-    DEG(8,172,6) = 0
-    DEG(8,172,7) = 0
-    DEG(8,172,8) = 0
-    DEG(8,172,9) = 0
-    DEG(8,172,10) = 0
-    DEG(8,172,11) = 1
-    DEG(8,172,12) = 0
-  COEF(8,172) = (1.9670576798090837, 0)
-    DEG(8,173,1) = 0
-    DEG(8,173,2) = 1
-    DEG(8,173,3) = 0
-    DEG(8,173,4) = 0
-    DEG(8,173,5) = 1
-    DEG(8,173,6) = 0
-    DEG(8,173,7) = 0
-    DEG(8,173,8) = 0
-    DEG(8,173,9) = 0
-    DEG(8,173,10) = 0
-    DEG(8,173,11) = 1
-    DEG(8,173,12) = 0
-  COEF(8,173) = (-0.1054039245983641, 0)
-    DEG(8,174,1) = 0
-    DEG(8,174,2) = 1
-    DEG(8,174,3) = 0
-    DEG(8,174,4) = 0
-    DEG(8,174,5) = 0
-    DEG(8,174,6) = 1
-    DEG(8,174,7) = 0
-    DEG(8,174,8) = 0
-    DEG(8,174,9) = 0
-    DEG(8,174,10) = 0
-    DEG(8,174,11) = 1
-    DEG(8,174,12) = 0
-  COEF(8,174) = (0.3134939004480767, 0)
-    DEG(8,175,1) = 0
-    DEG(8,175,2) = 0
-    DEG(8,175,3) = 0
-    DEG(8,175,4) = 0
-    DEG(8,175,5) = 0
-    DEG(8,175,6) = 0
-    DEG(8,175,7) = 1
-    DEG(8,175,8) = 0
-    DEG(8,175,9) = 0
-    DEG(8,175,10) = 0
-    DEG(8,175,11) = 1
-    DEG(8,175,12) = 0
-  COEF(8,175) = (0.9717430606808847, 0)
-    DEG(8,176,1) = 0
-    DEG(8,176,2) = 1
-    DEG(8,176,3) = 0
-    DEG(8,176,4) = 1
-    DEG(8,176,5) = 0
-    DEG(8,176,6) = 0
-    DEG(8,176,7) = 1
-    DEG(8,176,8) = 0
-    DEG(8,176,9) = 0
-    DEG(8,176,10) = 0
-    DEG(8,176,11) = 1
-    DEG(8,176,12) = 0
-  COEF(8,176) = (1.212132798533325, 0)
-    DEG(8,177,1) = 0
-    DEG(8,177,2) = 1
-    DEG(8,177,3) = 0
-    DEG(8,177,4) = 0
-    DEG(8,177,5) = 1
-    DEG(8,177,6) = 0
-    DEG(8,177,7) = 1
-    DEG(8,177,8) = 0
-    DEG(8,177,9) = 0
-    DEG(8,177,10) = 0
-    DEG(8,177,11) = 1
-    DEG(8,177,12) = 0
-  COEF(8,177) = (-0.9717430606808847, 0)
-    DEG(8,178,1) = 0
-    DEG(8,178,2) = 1
-    DEG(8,178,3) = 0
-    DEG(8,178,4) = 0
-    DEG(8,178,5) = 0
-    DEG(8,178,6) = 1
-    DEG(8,178,7) = 1
-    DEG(8,178,8) = 0
-    DEG(8,178,9) = 0
-    DEG(8,178,10) = 0
-    DEG(8,178,11) = 1
-    DEG(8,178,12) = 0
-  COEF(8,178) = (0.02838100287479828, 0)
-    DEG(8,179,1) = 0
-    DEG(8,179,2) = 0
-    DEG(8,179,3) = 0
-    DEG(8,179,4) = 0
-    DEG(8,179,5) = 0
-    DEG(8,179,6) = 0
-    DEG(8,179,7) = 0
-    DEG(8,179,8) = 1
-    DEG(8,179,9) = 0
-    DEG(8,179,10) = 0
-    DEG(8,179,11) = 1
-    DEG(8,179,12) = 0
-  COEF(8,179) = (0.31455604998454945, 0)
-    DEG(8,180,1) = 0
-    DEG(8,180,2) = 1
-    DEG(8,180,3) = 0
-    DEG(8,180,4) = 1
-    DEG(8,180,5) = 0
-    DEG(8,180,6) = 0
-    DEG(8,180,7) = 0
-    DEG(8,180,8) = 1
-    DEG(8,180,9) = 0
-    DEG(8,180,10) = 0
-    DEG(8,180,11) = 1
-    DEG(8,180,12) = 0
-  COEF(8,180) = (-1.144865957817944, 0)
-    DEG(8,181,1) = 0
-    DEG(8,181,2) = 1
-    DEG(8,181,3) = 0
-    DEG(8,181,4) = 0
-    DEG(8,181,5) = 1
-    DEG(8,181,6) = 0
-    DEG(8,181,7) = 0
-    DEG(8,181,8) = 1
-    DEG(8,181,9) = 0
-    DEG(8,181,10) = 0
-    DEG(8,181,11) = 1
-    DEG(8,181,12) = 0
-  COEF(8,181) = (-0.31455604998454945, 0)
-    DEG(8,182,1) = 0
-    DEG(8,182,2) = 1
-    DEG(8,182,3) = 0
-    DEG(8,182,4) = 0
-    DEG(8,182,5) = 0
-    DEG(8,182,6) = 1
-    DEG(8,182,7) = 0
-    DEG(8,182,8) = 1
-    DEG(8,182,9) = 0
-    DEG(8,182,10) = 0
-    DEG(8,182,11) = 1
-    DEG(8,182,12) = 0
-  COEF(8,182) = (0.5428957927935338, 0)
-    DEG(8,183,1) = 0
-    DEG(8,183,2) = 0
-    DEG(8,183,3) = 0
-    DEG(8,183,4) = 0
-    DEG(8,183,5) = 0
-    DEG(8,183,6) = 0
-    DEG(8,183,7) = 0
-    DEG(8,183,8) = 0
-    DEG(8,183,9) = 1
-    DEG(8,183,10) = 0
-    DEG(8,183,11) = 1
-    DEG(8,183,12) = 0
-  COEF(8,183) = (1.2768770869276158, 0)
-    DEG(8,184,1) = 0
-    DEG(8,184,2) = 1
-    DEG(8,184,3) = 0
-    DEG(8,184,4) = 1
-    DEG(8,184,5) = 0
-    DEG(8,184,6) = 0
-    DEG(8,184,7) = 0
-    DEG(8,184,8) = 0
-    DEG(8,184,9) = 1
-    DEG(8,184,10) = 0
-    DEG(8,184,11) = 1
-    DEG(8,184,12) = 0
-  COEF(8,184) = (-0.340521182301978, 0)
-    DEG(8,185,1) = 0
-    DEG(8,185,2) = 1
-    DEG(8,185,3) = 0
-    DEG(8,185,4) = 0
-    DEG(8,185,5) = 1
-    DEG(8,185,6) = 0
-    DEG(8,185,7) = 0
-    DEG(8,185,8) = 0
-    DEG(8,185,9) = 1
-    DEG(8,185,10) = 0
-    DEG(8,185,11) = 1
-    DEG(8,185,12) = 0
-  COEF(8,185) = (-1.2768770869276158, 0)
-    DEG(8,186,1) = 0
-    DEG(8,186,2) = 1
-    DEG(8,186,3) = 0
-    DEG(8,186,4) = 0
-    DEG(8,186,5) = 0
-    DEG(8,186,6) = 1
-    DEG(8,186,7) = 0
-    DEG(8,186,8) = 0
-    DEG(8,186,9) = 1
-    DEG(8,186,10) = 0
-    DEG(8,186,11) = 1
-    DEG(8,186,12) = 0
-  COEF(8,186) = (0.7084999114166955, 0)
-    DEG(8,187,1) = 0
-    DEG(8,187,2) = 0
-    DEG(8,187,3) = 0
-    DEG(8,187,4) = 0
-    DEG(8,187,5) = 0
-    DEG(8,187,6) = 0
-    DEG(8,187,7) = 0
-    DEG(8,187,8) = 0
-    DEG(8,187,9) = 0
-    DEG(8,187,10) = 0
-    DEG(8,187,11) = 0
-    DEG(8,187,12) = 1
-  COEF(8,187) = (-0.3134939004480767, 0)
-    DEG(8,188,1) = 0
-    DEG(8,188,2) = 0
-    DEG(8,188,3) = 1
-    DEG(8,188,4) = 1
-    DEG(8,188,5) = 0
-    DEG(8,188,6) = 0
-    DEG(8,188,7) = 0
-    DEG(8,188,8) = 0
-    DEG(8,188,9) = 0
-    DEG(8,188,10) = 0
-    DEG(8,188,11) = 0
-    DEG(8,188,12) = 1
-  COEF(8,188) = (1.9670576798090837, 0)
-    DEG(8,189,1) = 0
-    DEG(8,189,2) = 0
-    DEG(8,189,3) = 1
-    DEG(8,189,4) = 0
-    DEG(8,189,5) = 1
-    DEG(8,189,6) = 0
-    DEG(8,189,7) = 0
-    DEG(8,189,8) = 0
-    DEG(8,189,9) = 0
-    DEG(8,189,10) = 0
-    DEG(8,189,11) = 0
-    DEG(8,189,12) = 1
-  COEF(8,189) = (-0.1054039245983641, 0)
-    DEG(8,190,1) = 0
-    DEG(8,190,2) = 0
-    DEG(8,190,3) = 1
-    DEG(8,190,4) = 0
-    DEG(8,190,5) = 0
-    DEG(8,190,6) = 1
-    DEG(8,190,7) = 0
-    DEG(8,190,8) = 0
-    DEG(8,190,9) = 0
-    DEG(8,190,10) = 0
-    DEG(8,190,11) = 0
-    DEG(8,190,12) = 1
-  COEF(8,190) = (0.3134939004480767, 0)
-    DEG(8,191,1) = 0
-    DEG(8,191,2) = 0
-    DEG(8,191,3) = 0
-    DEG(8,191,4) = 0
-    DEG(8,191,5) = 0
-    DEG(8,191,6) = 0
-    DEG(8,191,7) = 1
-    DEG(8,191,8) = 0
-    DEG(8,191,9) = 0
-    DEG(8,191,10) = 0
-    DEG(8,191,11) = 0
-    DEG(8,191,12) = 1
-  COEF(8,191) = (-0.02838100287479828, 0)
-    DEG(8,192,1) = 0
-    DEG(8,192,2) = 0
-    DEG(8,192,3) = 1
-    DEG(8,192,4) = 1
-    DEG(8,192,5) = 0
-    DEG(8,192,6) = 0
-    DEG(8,192,7) = 1
-    DEG(8,192,8) = 0
-    DEG(8,192,9) = 0
-    DEG(8,192,10) = 0
-    DEG(8,192,11) = 0
-    DEG(8,192,12) = 1
-  COEF(8,192) = (1.212132798533325, 0)
-    DEG(8,193,1) = 0
-    DEG(8,193,2) = 0
-    DEG(8,193,3) = 1
-    DEG(8,193,4) = 0
-    DEG(8,193,5) = 1
-    DEG(8,193,6) = 0
-    DEG(8,193,7) = 1
-    DEG(8,193,8) = 0
-    DEG(8,193,9) = 0
-    DEG(8,193,10) = 0
-    DEG(8,193,11) = 0
-    DEG(8,193,12) = 1
-  COEF(8,193) = (-0.9717430606808847, 0)
-    DEG(8,194,1) = 0
-    DEG(8,194,2) = 0
-    DEG(8,194,3) = 1
-    DEG(8,194,4) = 0
-    DEG(8,194,5) = 0
-    DEG(8,194,6) = 1
-    DEG(8,194,7) = 1
-    DEG(8,194,8) = 0
-    DEG(8,194,9) = 0
-    DEG(8,194,10) = 0
-    DEG(8,194,11) = 0
-    DEG(8,194,12) = 1
-  COEF(8,194) = (0.02838100287479828, 0)
-    DEG(8,195,1) = 0
-    DEG(8,195,2) = 0
-    DEG(8,195,3) = 0
-    DEG(8,195,4) = 0
-    DEG(8,195,5) = 0
-    DEG(8,195,6) = 0
-    DEG(8,195,7) = 0
-    DEG(8,195,8) = 1
-    DEG(8,195,9) = 0
-    DEG(8,195,10) = 0
-    DEG(8,195,11) = 0
-    DEG(8,195,12) = 1
-  COEF(8,195) = (-0.5428957927935338, 0)
-    DEG(8,196,1) = 0
-    DEG(8,196,2) = 0
-    DEG(8,196,3) = 1
-    DEG(8,196,4) = 1
-    DEG(8,196,5) = 0
-    DEG(8,196,6) = 0
-    DEG(8,196,7) = 0
-    DEG(8,196,8) = 1
-    DEG(8,196,9) = 0
-    DEG(8,196,10) = 0
-    DEG(8,196,11) = 0
-    DEG(8,196,12) = 1
-  COEF(8,196) = (-1.144865957817944, 0)
-    DEG(8,197,1) = 0
-    DEG(8,197,2) = 0
-    DEG(8,197,3) = 1
-    DEG(8,197,4) = 0
-    DEG(8,197,5) = 1
-    DEG(8,197,6) = 0
-    DEG(8,197,7) = 0
-    DEG(8,197,8) = 1
-    DEG(8,197,9) = 0
-    DEG(8,197,10) = 0
-    DEG(8,197,11) = 0
-    DEG(8,197,12) = 1
-  COEF(8,197) = (-0.31455604998454945, 0)
-    DEG(8,198,1) = 0
-    DEG(8,198,2) = 0
-    DEG(8,198,3) = 1
-    DEG(8,198,4) = 0
-    DEG(8,198,5) = 0
-    DEG(8,198,6) = 1
-    DEG(8,198,7) = 0
-    DEG(8,198,8) = 1
-    DEG(8,198,9) = 0
-    DEG(8,198,10) = 0
-    DEG(8,198,11) = 0
-    DEG(8,198,12) = 1
-  COEF(8,198) = (0.5428957927935338, 0)
-    DEG(8,199,1) = 0
-    DEG(8,199,2) = 0
-    DEG(8,199,3) = 0
-    DEG(8,199,4) = 0
-    DEG(8,199,5) = 0
-    DEG(8,199,6) = 0
-    DEG(8,199,7) = 0
-    DEG(8,199,8) = 0
-    DEG(8,199,9) = 1
-    DEG(8,199,10) = 0
-    DEG(8,199,11) = 0
-    DEG(8,199,12) = 1
-  COEF(8,199) = (-0.7084999114166955, 0)
-    DEG(8,200,1) = 0
-    DEG(8,200,2) = 0
-    DEG(8,200,3) = 1
-    DEG(8,200,4) = 1
-    DEG(8,200,5) = 0
-    DEG(8,200,6) = 0
-    DEG(8,200,7) = 0
-    DEG(8,200,8) = 0
-    DEG(8,200,9) = 1
-    DEG(8,200,10) = 0
-    DEG(8,200,11) = 0
-    DEG(8,200,12) = 1
-  COEF(8,200) = (-0.340521182301978, 0)
-    DEG(8,201,1) = 0
-    DEG(8,201,2) = 0
-    DEG(8,201,3) = 1
-    DEG(8,201,4) = 0
-    DEG(8,201,5) = 1
-    DEG(8,201,6) = 0
-    DEG(8,201,7) = 0
-    DEG(8,201,8) = 0
-    DEG(8,201,9) = 1
-    DEG(8,201,10) = 0
-    DEG(8,201,11) = 0
-    DEG(8,201,12) = 1
-  COEF(8,201) = (-1.2768770869276158, 0)
-    DEG(8,202,1) = 0
-    DEG(8,202,2) = 0
-    DEG(8,202,3) = 1
-    DEG(8,202,4) = 0
-    DEG(8,202,5) = 0
-    DEG(8,202,6) = 1
-    DEG(8,202,7) = 0
-    DEG(8,202,8) = 0
-    DEG(8,202,9) = 1
-    DEG(8,202,10) = 0
-    DEG(8,202,11) = 0
-    DEG(8,202,12) = 1
-  COEF(8,202) = (0.7084999114166955, 0)
-
-NUM_TERMS(9) = 202
-    DEG(9,1,1) = 0
-    DEG(9,1,2) = 0
-    DEG(9,1,3) = 0
-    DEG(9,1,4) = 0
-    DEG(9,1,5) = 0
-    DEG(9,1,6) = 0
-    DEG(9,1,7) = 0
-    DEG(9,1,8) = 0
-    DEG(9,1,9) = 0
-    DEG(9,1,10) = 0
-    DEG(9,1,11) = 0
-    DEG(9,1,12) = 0
-  COEF(9,1) = (-0.46647873585375904, 0)
-    DEG(9,2,1) = 1
-    DEG(9,2,2) = 0
-    DEG(9,2,3) = 0
-    DEG(9,2,4) = 1
-    DEG(9,2,5) = 0
-    DEG(9,2,6) = 0
-    DEG(9,2,7) = 0
-    DEG(9,2,8) = 0
-    DEG(9,2,9) = 0
-    DEG(9,2,10) = 0
-    DEG(9,2,11) = 0
-    DEG(9,2,12) = 0
-  COEF(9,2) = (1.9208308065942872, 0)
-    DEG(9,3,1) = 0
-    DEG(9,3,2) = 1
-    DEG(9,3,3) = 0
-    DEG(9,3,4) = 1
-    DEG(9,3,5) = 0
-    DEG(9,3,6) = 0
-    DEG(9,3,7) = 0
-    DEG(9,3,8) = 0
-    DEG(9,3,9) = 0
-    DEG(9,3,10) = 0
-    DEG(9,3,11) = 0
-    DEG(9,3,12) = 0
-  COEF(9,3) = (0.12522331417865495, 0)
-    DEG(9,4,1) = 0
-    DEG(9,4,2) = 0
-    DEG(9,4,3) = 1
-    DEG(9,4,4) = 1
-    DEG(9,4,5) = 0
-    DEG(9,4,6) = 0
-    DEG(9,4,7) = 0
-    DEG(9,4,8) = 0
-    DEG(9,4,9) = 0
-    DEG(9,4,10) = 0
-    DEG(9,4,11) = 0
-    DEG(9,4,12) = 0
-  COEF(9,4) = (-0.12968736935372377, 0)
-    DEG(9,5,1) = 0
-    DEG(9,5,2) = 0
-    DEG(9,5,3) = 0
-    DEG(9,5,4) = 2
-    DEG(9,5,5) = 0
-    DEG(9,5,6) = 0
-    DEG(9,5,7) = 0
-    DEG(9,5,8) = 0
-    DEG(9,5,9) = 0
-    DEG(9,5,10) = 0
-    DEG(9,5,11) = 0
-    DEG(9,5,12) = 0
-  COEF(9,5) = (-0.9604154032971436, 0)
-    DEG(9,6,1) = 1
-    DEG(9,6,2) = 0
-    DEG(9,6,3) = 0
-    DEG(9,6,4) = 0
-    DEG(9,6,5) = 1
-    DEG(9,6,6) = 0
-    DEG(9,6,7) = 0
-    DEG(9,6,8) = 0
-    DEG(9,6,9) = 0
-    DEG(9,6,10) = 0
-    DEG(9,6,11) = 0
-    DEG(9,6,12) = 0
-  COEF(9,6) = (0.12522331417865495, 0)
-    DEG(9,7,1) = 0
-    DEG(9,7,2) = 1
-    DEG(9,7,3) = 0
-    DEG(9,7,4) = 0
-    DEG(9,7,5) = 1
-    DEG(9,7,6) = 0
-    DEG(9,7,7) = 0
-    DEG(9,7,8) = 0
-    DEG(9,7,9) = 0
-    DEG(9,7,10) = 0
-    DEG(9,7,11) = 0
-    DEG(9,7,12) = 0
-  COEF(9,7) = (-0.8689868606461317, 0)
-    DEG(9,8,1) = 0
-    DEG(9,8,2) = 0
-    DEG(9,8,3) = 1
-    DEG(9,8,4) = 0
-    DEG(9,8,5) = 1
-    DEG(9,8,6) = 0
-    DEG(9,8,7) = 0
-    DEG(9,8,8) = 0
-    DEG(9,8,9) = 0
-    DEG(9,8,10) = 0
-    DEG(9,8,11) = 0
-    DEG(9,8,12) = 0
-  COEF(9,8) = (-0.3430613421275293, 0)
-    DEG(9,9,1) = 0
-    DEG(9,9,2) = 0
-    DEG(9,9,3) = 0
-    DEG(9,9,4) = 1
-    DEG(9,9,5) = 1
-    DEG(9,9,6) = 0
-    DEG(9,9,7) = 0
-    DEG(9,9,8) = 0
-    DEG(9,9,9) = 0
-    DEG(9,9,10) = 0
-    DEG(9,9,11) = 0
-    DEG(9,9,12) = 0
-  COEF(9,9) = (-0.12522331417865495, 0)
-    DEG(9,10,1) = 0
-    DEG(9,10,2) = 0
-    DEG(9,10,3) = 0
-    DEG(9,10,4) = 0
-    DEG(9,10,5) = 2
-    DEG(9,10,6) = 0
-    DEG(9,10,7) = 0
-    DEG(9,10,8) = 0
-    DEG(9,10,9) = 0
-    DEG(9,10,10) = 0
-    DEG(9,10,11) = 0
-    DEG(9,10,12) = 0
-  COEF(9,10) = (0.43449343032306587, 0)
-    DEG(9,11,1) = 1
-    DEG(9,11,2) = 0
-    DEG(9,11,3) = 0
-    DEG(9,11,4) = 0
-    DEG(9,11,5) = 0
-    DEG(9,11,6) = 1
-    DEG(9,11,7) = 0
-    DEG(9,11,8) = 0
-    DEG(9,11,9) = 0
-    DEG(9,11,10) = 0
-    DEG(9,11,11) = 0
-    DEG(9,11,12) = 0
-  COEF(9,11) = (-0.12968736935372377, 0)
-    DEG(9,12,1) = 0
-    DEG(9,12,2) = 1
-    DEG(9,12,3) = 0
-    DEG(9,12,4) = 0
-    DEG(9,12,5) = 0
-    DEG(9,12,6) = 1
-    DEG(9,12,7) = 0
-    DEG(9,12,8) = 0
-    DEG(9,12,9) = 0
-    DEG(9,12,10) = 0
-    DEG(9,12,11) = 0
-    DEG(9,12,12) = 0
-  COEF(9,12) = (-0.3430613421275293, 0)
-    DEG(9,13,1) = 0
-    DEG(9,13,2) = 0
-    DEG(9,13,3) = 1
-    DEG(9,13,4) = 0
-    DEG(9,13,5) = 0
-    DEG(9,13,6) = 1
-    DEG(9,13,7) = 0
-    DEG(9,13,8) = 0
-    DEG(9,13,9) = 0
-    DEG(9,13,10) = 0
-    DEG(9,13,11) = 0
-    DEG(9,13,12) = 0
-  COEF(9,13) = (-0.11888647424063739, 0)
-    DEG(9,14,1) = 0
-    DEG(9,14,2) = 0
-    DEG(9,14,3) = 0
-    DEG(9,14,4) = 1
-    DEG(9,14,5) = 0
-    DEG(9,14,6) = 1
-    DEG(9,14,7) = 0
-    DEG(9,14,8) = 0
-    DEG(9,14,9) = 0
-    DEG(9,14,10) = 0
-    DEG(9,14,11) = 0
-    DEG(9,14,12) = 0
-  COEF(9,14) = (0.12968736935372377, 0)
-    DEG(9,15,1) = 0
-    DEG(9,15,2) = 0
-    DEG(9,15,3) = 0
-    DEG(9,15,4) = 0
-    DEG(9,15,5) = 1
-    DEG(9,15,6) = 1
-    DEG(9,15,7) = 0
-    DEG(9,15,8) = 0
-    DEG(9,15,9) = 0
-    DEG(9,15,10) = 0
-    DEG(9,15,11) = 0
-    DEG(9,15,12) = 0
-  COEF(9,15) = (0.3430613421275293, 0)
-    DEG(9,16,1) = 0
-    DEG(9,16,2) = 0
-    DEG(9,16,3) = 0
-    DEG(9,16,4) = 0
-    DEG(9,16,5) = 0
-    DEG(9,16,6) = 2
-    DEG(9,16,7) = 0
-    DEG(9,16,8) = 0
-    DEG(9,16,9) = 0
-    DEG(9,16,10) = 0
-    DEG(9,16,11) = 0
-    DEG(9,16,12) = 0
-  COEF(9,16) = (0.059443237120318695, 0)
-    DEG(9,17,1) = 0
-    DEG(9,17,2) = 0
-    DEG(9,17,3) = 0
-    DEG(9,17,4) = 0
-    DEG(9,17,5) = 0
-    DEG(9,17,6) = 0
-    DEG(9,17,7) = 1
-    DEG(9,17,8) = 0
-    DEG(9,17,9) = 0
-    DEG(9,17,10) = 0
-    DEG(9,17,11) = 0
-    DEG(9,17,12) = 0
-  COEF(9,17) = (-2.855499374634474, 0)
-    DEG(9,18,1) = 1
-    DEG(9,18,2) = 0
-    DEG(9,18,3) = 0
-    DEG(9,18,4) = 1
-    DEG(9,18,5) = 0
-    DEG(9,18,6) = 0
-    DEG(9,18,7) = 1
-    DEG(9,18,8) = 0
-    DEG(9,18,9) = 0
-    DEG(9,18,10) = 0
-    DEG(9,18,11) = 0
-    DEG(9,18,12) = 0
-  COEF(9,18) = (3.943875142095645, 0)
-    DEG(9,19,1) = 0
-    DEG(9,19,2) = 1
-    DEG(9,19,3) = 0
-    DEG(9,19,4) = 1
-    DEG(9,19,5) = 0
-    DEG(9,19,6) = 0
-    DEG(9,19,7) = 1
-    DEG(9,19,8) = 0
-    DEG(9,19,9) = 0
-    DEG(9,19,10) = 0
-    DEG(9,19,11) = 0
-    DEG(9,19,12) = 0
-  COEF(9,19) = (-0.3079853911607325, 0)
-    DEG(9,20,1) = 0
-    DEG(9,20,2) = 0
-    DEG(9,20,3) = 1
-    DEG(9,20,4) = 1
-    DEG(9,20,5) = 0
-    DEG(9,20,6) = 0
-    DEG(9,20,7) = 1
-    DEG(9,20,8) = 0
-    DEG(9,20,9) = 0
-    DEG(9,20,10) = 0
-    DEG(9,20,11) = 0
-    DEG(9,20,12) = 0
-  COEF(9,20) = (-0.5232174433544426, 0)
-    DEG(9,21,1) = 0
-    DEG(9,21,2) = 0
-    DEG(9,21,3) = 0
-    DEG(9,21,4) = 2
-    DEG(9,21,5) = 0
-    DEG(9,21,6) = 0
-    DEG(9,21,7) = 1
-    DEG(9,21,8) = 0
-    DEG(9,21,9) = 0
-    DEG(9,21,10) = 0
-    DEG(9,21,11) = 0
-    DEG(9,21,12) = 0
-  COEF(9,21) = (-1.9719375710478224, 0)
-    DEG(9,22,1) = 1
-    DEG(9,22,2) = 0
-    DEG(9,22,3) = 0
-    DEG(9,22,4) = 0
-    DEG(9,22,5) = 1
-    DEG(9,22,6) = 0
-    DEG(9,22,7) = 1
-    DEG(9,22,8) = 0
-    DEG(9,22,9) = 0
-    DEG(9,22,10) = 0
-    DEG(9,22,11) = 0
-    DEG(9,22,12) = 0
-  COEF(9,22) = (-0.3079853911607325, 0)
-    DEG(9,23,1) = 0
-    DEG(9,23,2) = 1
-    DEG(9,23,3) = 0
-    DEG(9,23,4) = 0
-    DEG(9,23,5) = 1
-    DEG(9,23,6) = 0
-    DEG(9,23,7) = 1
-    DEG(9,23,8) = 0
-    DEG(9,23,9) = 0
-    DEG(9,23,10) = 0
-    DEG(9,23,11) = 0
-    DEG(9,23,12) = 0
-  COEF(9,23) = (1.6914101098445486, 0)
-    DEG(9,24,1) = 0
-    DEG(9,24,2) = 0
-    DEG(9,24,3) = 1
-    DEG(9,24,4) = 0
-    DEG(9,24,5) = 1
-    DEG(9,24,6) = 0
-    DEG(9,24,7) = 1
-    DEG(9,24,8) = 0
-    DEG(9,24,9) = 0
-    DEG(9,24,10) = 0
-    DEG(9,24,11) = 0
-    DEG(9,24,12) = 0
-  COEF(9,24) = (0.36770997641604974, 0)
-    DEG(9,25,1) = 0
-    DEG(9,25,2) = 0
-    DEG(9,25,3) = 0
-    DEG(9,25,4) = 1
-    DEG(9,25,5) = 1
-    DEG(9,25,6) = 0
-    DEG(9,25,7) = 1
-    DEG(9,25,8) = 0
-    DEG(9,25,9) = 0
-    DEG(9,25,10) = 0
-    DEG(9,25,11) = 0
-    DEG(9,25,12) = 0
-  COEF(9,25) = (0.3079853911607325, 0)
-    DEG(9,26,1) = 0
-    DEG(9,26,2) = 0
-    DEG(9,26,3) = 0
-    DEG(9,26,4) = 0
-    DEG(9,26,5) = 2
-    DEG(9,26,6) = 0
-    DEG(9,26,7) = 1
-    DEG(9,26,8) = 0
-    DEG(9,26,9) = 0
-    DEG(9,26,10) = 0
-    DEG(9,26,11) = 0
-    DEG(9,26,12) = 0
-  COEF(9,26) = (-0.8457050549222743, 0)
-    DEG(9,27,1) = 1
-    DEG(9,27,2) = 0
-    DEG(9,27,3) = 0
-    DEG(9,27,4) = 0
-    DEG(9,27,5) = 0
-    DEG(9,27,6) = 1
-    DEG(9,27,7) = 1
-    DEG(9,27,8) = 0
-    DEG(9,27,9) = 0
-    DEG(9,27,10) = 0
-    DEG(9,27,11) = 0
-    DEG(9,27,12) = 0
-  COEF(9,27) = (-0.5232174433544426, 0)
-    DEG(9,28,1) = 0
-    DEG(9,28,2) = 1
-    DEG(9,28,3) = 0
-    DEG(9,28,4) = 0
-    DEG(9,28,5) = 0
-    DEG(9,28,6) = 1
-    DEG(9,28,7) = 1
-    DEG(9,28,8) = 0
-    DEG(9,28,9) = 0
-    DEG(9,28,10) = 0
-    DEG(9,28,11) = 0
-    DEG(9,28,12) = 0
-  COEF(9,28) = (0.36770997641604974, 0)
-    DEG(9,29,1) = 0
-    DEG(9,29,2) = 0
-    DEG(9,29,3) = 1
-    DEG(9,29,4) = 0
-    DEG(9,29,5) = 0
-    DEG(9,29,6) = 1
-    DEG(9,29,7) = 1
-    DEG(9,29,8) = 0
-    DEG(9,29,9) = 0
-    DEG(9,29,10) = 0
-    DEG(9,29,11) = 0
-    DEG(9,29,12) = 0
-  COEF(9,29) = (0.07571349732875463, 0)
-    DEG(9,30,1) = 0
-    DEG(9,30,2) = 0
-    DEG(9,30,3) = 0
-    DEG(9,30,4) = 1
-    DEG(9,30,5) = 0
-    DEG(9,30,6) = 1
-    DEG(9,30,7) = 1
-    DEG(9,30,8) = 0
-    DEG(9,30,9) = 0
-    DEG(9,30,10) = 0
-    DEG(9,30,11) = 0
-    DEG(9,30,12) = 0
-  COEF(9,30) = (0.5232174433544426, 0)
-    DEG(9,31,1) = 0
-    DEG(9,31,2) = 0
-    DEG(9,31,3) = 0
-    DEG(9,31,4) = 0
-    DEG(9,31,5) = 1
-    DEG(9,31,6) = 1
-    DEG(9,31,7) = 1
-    DEG(9,31,8) = 0
-    DEG(9,31,9) = 0
-    DEG(9,31,10) = 0
-    DEG(9,31,11) = 0
-    DEG(9,31,12) = 0
-  COEF(9,31) = (-0.36770997641604974, 0)
-    DEG(9,32,1) = 0
-    DEG(9,32,2) = 0
-    DEG(9,32,3) = 0
-    DEG(9,32,4) = 0
-    DEG(9,32,5) = 0
-    DEG(9,32,6) = 2
-    DEG(9,32,7) = 1
-    DEG(9,32,8) = 0
-    DEG(9,32,9) = 0
-    DEG(9,32,10) = 0
-    DEG(9,32,11) = 0
-    DEG(9,32,12) = 0
-  COEF(9,32) = (-0.03785674866437731, 0)
-    DEG(9,33,1) = 1
-    DEG(9,33,2) = 0
-    DEG(9,33,3) = 0
-    DEG(9,33,4) = 1
-    DEG(9,33,5) = 0
-    DEG(9,33,6) = 0
-    DEG(9,33,7) = 2
-    DEG(9,33,8) = 0
-    DEG(9,33,9) = 0
-    DEG(9,33,10) = 0
-    DEG(9,33,11) = 0
-    DEG(9,33,12) = 0
-  COEF(9,33) = (0.45461540830686736, 0)
-    DEG(9,34,1) = 0
-    DEG(9,34,2) = 1
-    DEG(9,34,3) = 0
-    DEG(9,34,4) = 1
-    DEG(9,34,5) = 0
-    DEG(9,34,6) = 0
-    DEG(9,34,7) = 2
-    DEG(9,34,8) = 0
-    DEG(9,34,9) = 0
-    DEG(9,34,10) = 0
-    DEG(9,34,11) = 0
-    DEG(9,34,12) = 0
-  COEF(9,34) = (1.8235950272842303, 0)
-    DEG(9,35,1) = 0
-    DEG(9,35,2) = 0
-    DEG(9,35,3) = 1
-    DEG(9,35,4) = 1
-    DEG(9,35,5) = 0
-    DEG(9,35,6) = 0
-    DEG(9,35,7) = 2
-    DEG(9,35,8) = 0
-    DEG(9,35,9) = 0
-    DEG(9,35,10) = 0
-    DEG(9,35,11) = 0
-    DEG(9,35,12) = 0
-  COEF(9,35) = (0.20546651940781435, 0)
-    DEG(9,36,1) = 0
-    DEG(9,36,2) = 0
-    DEG(9,36,3) = 0
-    DEG(9,36,4) = 2
-    DEG(9,36,5) = 0
-    DEG(9,36,6) = 0
-    DEG(9,36,7) = 2
-    DEG(9,36,8) = 0
-    DEG(9,36,9) = 0
-    DEG(9,36,10) = 0
-    DEG(9,36,11) = 0
-    DEG(9,36,12) = 0
-  COEF(9,36) = (-0.22730770415343368, 0)
-    DEG(9,37,1) = 1
-    DEG(9,37,2) = 0
-    DEG(9,37,3) = 0
-    DEG(9,37,4) = 0
-    DEG(9,37,5) = 1
-    DEG(9,37,6) = 0
-    DEG(9,37,7) = 2
-    DEG(9,37,8) = 0
-    DEG(9,37,9) = 0
-    DEG(9,37,10) = 0
-    DEG(9,37,11) = 0
-    DEG(9,37,12) = 0
-  COEF(9,37) = (1.8235950272842303, 0)
-    DEG(9,38,1) = 0
-    DEG(9,38,2) = 1
-    DEG(9,38,3) = 0
-    DEG(9,38,4) = 0
-    DEG(9,38,5) = 1
-    DEG(9,38,6) = 0
-    DEG(9,38,7) = 2
-    DEG(9,38,8) = 0
-    DEG(9,38,9) = 0
-    DEG(9,38,10) = 0
-    DEG(9,38,11) = 0
-    DEG(9,38,12) = 0
-  COEF(9,38) = (-0.44268886684933506, 0)
-    DEG(9,39,1) = 0
-    DEG(9,39,2) = 0
-    DEG(9,39,3) = 1
-    DEG(9,39,4) = 0
-    DEG(9,39,5) = 1
-    DEG(9,39,6) = 0
-    DEG(9,39,7) = 2
-    DEG(9,39,8) = 0
-    DEG(9,39,9) = 0
-    DEG(9,39,10) = 0
-    DEG(9,39,11) = 0
-    DEG(9,39,12) = 0
-  COEF(9,39) = (-0.0774311955979373, 0)
-    DEG(9,40,1) = 0
-    DEG(9,40,2) = 0
-    DEG(9,40,3) = 0
-    DEG(9,40,4) = 1
-    DEG(9,40,5) = 1
-    DEG(9,40,6) = 0
-    DEG(9,40,7) = 2
-    DEG(9,40,8) = 0
-    DEG(9,40,9) = 0
-    DEG(9,40,10) = 0
-    DEG(9,40,11) = 0
-    DEG(9,40,12) = 0
-  COEF(9,40) = (-1.8235950272842303, 0)
-    DEG(9,41,1) = 0
-    DEG(9,41,2) = 0
-    DEG(9,41,3) = 0
-    DEG(9,41,4) = 0
-    DEG(9,41,5) = 2
-    DEG(9,41,6) = 0
-    DEG(9,41,7) = 2
-    DEG(9,41,8) = 0
-    DEG(9,41,9) = 0
-    DEG(9,41,10) = 0
-    DEG(9,41,11) = 0
-    DEG(9,41,12) = 0
-  COEF(9,41) = (0.22134443342466753, 0)
-    DEG(9,42,1) = 1
-    DEG(9,42,2) = 0
-    DEG(9,42,3) = 0
-    DEG(9,42,4) = 0
-    DEG(9,42,5) = 0
-    DEG(9,42,6) = 1
-    DEG(9,42,7) = 2
-    DEG(9,42,8) = 0
-    DEG(9,42,9) = 0
-    DEG(9,42,10) = 0
-    DEG(9,42,11) = 0
-    DEG(9,42,12) = 0
-  COEF(9,42) = (0.20546651940781435, 0)
-    DEG(9,43,1) = 0
-    DEG(9,43,2) = 1
-    DEG(9,43,3) = 0
-    DEG(9,43,4) = 0
-    DEG(9,43,5) = 0
-    DEG(9,43,6) = 1
-    DEG(9,43,7) = 2
-    DEG(9,43,8) = 0
-    DEG(9,43,9) = 0
-    DEG(9,43,10) = 0
-    DEG(9,43,11) = 0
-    DEG(9,43,12) = 0
-  COEF(9,43) = (-0.0774311955979373, 0)
-    DEG(9,44,1) = 0
-    DEG(9,44,2) = 0
-    DEG(9,44,3) = 1
-    DEG(9,44,4) = 0
-    DEG(9,44,5) = 0
-    DEG(9,44,6) = 1
-    DEG(9,44,7) = 2
-    DEG(9,44,8) = 0
-    DEG(9,44,9) = 0
-    DEG(9,44,10) = 0
-    DEG(9,44,11) = 0
-    DEG(9,44,12) = 0
-  COEF(9,44) = (-0.011926541457532289, 0)
-    DEG(9,45,1) = 0
-    DEG(9,45,2) = 0
-    DEG(9,45,3) = 0
-    DEG(9,45,4) = 1
-    DEG(9,45,5) = 0
-    DEG(9,45,6) = 1
-    DEG(9,45,7) = 2
-    DEG(9,45,8) = 0
-    DEG(9,45,9) = 0
-    DEG(9,45,10) = 0
-    DEG(9,45,11) = 0
-    DEG(9,45,12) = 0
-  COEF(9,45) = (-0.20546651940781435, 0)
-    DEG(9,46,1) = 0
-    DEG(9,46,2) = 0
-    DEG(9,46,3) = 0
-    DEG(9,46,4) = 0
-    DEG(9,46,5) = 1
-    DEG(9,46,6) = 1
-    DEG(9,46,7) = 2
-    DEG(9,46,8) = 0
-    DEG(9,46,9) = 0
-    DEG(9,46,10) = 0
-    DEG(9,46,11) = 0
-    DEG(9,46,12) = 0
-  COEF(9,46) = (0.0774311955979373, 0)
-    DEG(9,47,1) = 0
-    DEG(9,47,2) = 0
-    DEG(9,47,3) = 0
-    DEG(9,47,4) = 0
-    DEG(9,47,5) = 0
-    DEG(9,47,6) = 2
-    DEG(9,47,7) = 2
-    DEG(9,47,8) = 0
-    DEG(9,47,9) = 0
-    DEG(9,47,10) = 0
-    DEG(9,47,11) = 0
-    DEG(9,47,12) = 0
-  COEF(9,47) = (0.005963270728766144, 0)
-    DEG(9,48,1) = 0
-    DEG(9,48,2) = 0
-    DEG(9,48,3) = 0
-    DEG(9,48,4) = 0
-    DEG(9,48,5) = 0
-    DEG(9,48,6) = 0
-    DEG(9,48,7) = 0
-    DEG(9,48,8) = 1
-    DEG(9,48,9) = 0
-    DEG(9,48,10) = 0
-    DEG(9,48,11) = 0
-    DEG(9,48,12) = 0
-  COEF(9,48) = (0.4698254097960001, 0)
-    DEG(9,49,1) = 1
-    DEG(9,49,2) = 0
-    DEG(9,49,3) = 0
-    DEG(9,49,4) = 1
-    DEG(9,49,5) = 0
-    DEG(9,49,6) = 0
-    DEG(9,49,7) = 0
-    DEG(9,49,8) = 1
-    DEG(9,49,9) = 0
-    DEG(9,49,10) = 0
-    DEG(9,49,11) = 0
-    DEG(9,49,12) = 0
-  COEF(9,49) = (1.0437691047079098, 0)
-    DEG(9,50,1) = 0
-    DEG(9,50,2) = 1
-    DEG(9,50,3) = 0
-    DEG(9,50,4) = 1
-    DEG(9,50,5) = 0
-    DEG(9,50,6) = 0
-    DEG(9,50,7) = 0
-    DEG(9,50,8) = 1
-    DEG(9,50,9) = 0
-    DEG(9,50,10) = 0
-    DEG(9,50,11) = 0
-    DEG(9,50,12) = 0
-  COEF(9,50) = (-1.3851483259388266, 0)
-    DEG(9,51,1) = 0
-    DEG(9,51,2) = 0
-    DEG(9,51,3) = 1
-    DEG(9,51,4) = 1
-    DEG(9,51,5) = 0
-    DEG(9,51,6) = 0
-    DEG(9,51,7) = 0
-    DEG(9,51,8) = 1
-    DEG(9,51,9) = 0
-    DEG(9,51,10) = 0
-    DEG(9,51,11) = 0
-    DEG(9,51,12) = 0
-  COEF(9,51) = (1.3508001213496954, 0)
-    DEG(9,52,1) = 0
-    DEG(9,52,2) = 0
-    DEG(9,52,3) = 0
-    DEG(9,52,4) = 2
-    DEG(9,52,5) = 0
-    DEG(9,52,6) = 0
-    DEG(9,52,7) = 0
-    DEG(9,52,8) = 1
-    DEG(9,52,9) = 0
-    DEG(9,52,10) = 0
-    DEG(9,52,11) = 0
-    DEG(9,52,12) = 0
-  COEF(9,52) = (-0.5218845523539549, 0)
-    DEG(9,53,1) = 1
-    DEG(9,53,2) = 0
-    DEG(9,53,3) = 0
-    DEG(9,53,4) = 0
-    DEG(9,53,5) = 1
-    DEG(9,53,6) = 0
-    DEG(9,53,7) = 0
-    DEG(9,53,8) = 1
-    DEG(9,53,9) = 0
-    DEG(9,53,10) = 0
-    DEG(9,53,11) = 0
-    DEG(9,53,12) = 0
-  COEF(9,53) = (-1.3851483259388266, 0)
-    DEG(9,54,1) = 0
-    DEG(9,54,2) = 1
-    DEG(9,54,3) = 0
-    DEG(9,54,4) = 0
-    DEG(9,54,5) = 1
-    DEG(9,54,6) = 0
-    DEG(9,54,7) = 0
-    DEG(9,54,8) = 1
-    DEG(9,54,9) = 0
-    DEG(9,54,10) = 0
-    DEG(9,54,11) = 0
-    DEG(9,54,12) = 0
-  COEF(9,54) = (-1.868986509822055, 0)
-    DEG(9,55,1) = 0
-    DEG(9,55,2) = 0
-    DEG(9,55,3) = 1
-    DEG(9,55,4) = 0
-    DEG(9,55,5) = 1
-    DEG(9,55,6) = 0
-    DEG(9,55,7) = 0
-    DEG(9,55,8) = 1
-    DEG(9,55,9) = 0
-    DEG(9,55,10) = 0
-    DEG(9,55,11) = 0
-    DEG(9,55,12) = 0
-  COEF(9,55) = (-0.039688003668534214, 0)
-    DEG(9,56,1) = 0
-    DEG(9,56,2) = 0
-    DEG(9,56,3) = 0
-    DEG(9,56,4) = 1
-    DEG(9,56,5) = 1
-    DEG(9,56,6) = 0
-    DEG(9,56,7) = 0
-    DEG(9,56,8) = 1
-    DEG(9,56,9) = 0
-    DEG(9,56,10) = 0
-    DEG(9,56,11) = 0
-    DEG(9,56,12) = 0
-  COEF(9,56) = (1.3851483259388266, 0)
-    DEG(9,57,1) = 0
-    DEG(9,57,2) = 0
-    DEG(9,57,3) = 0
-    DEG(9,57,4) = 0
-    DEG(9,57,5) = 2
-    DEG(9,57,6) = 0
-    DEG(9,57,7) = 0
-    DEG(9,57,8) = 1
-    DEG(9,57,9) = 0
-    DEG(9,57,10) = 0
-    DEG(9,57,11) = 0
-    DEG(9,57,12) = 0
-  COEF(9,57) = (0.9344932549110275, 0)
-    DEG(9,58,1) = 1
-    DEG(9,58,2) = 0
-    DEG(9,58,3) = 0
-    DEG(9,58,4) = 0
-    DEG(9,58,5) = 0
-    DEG(9,58,6) = 1
-    DEG(9,58,7) = 0
-    DEG(9,58,8) = 1
-    DEG(9,58,9) = 0
-    DEG(9,58,10) = 0
-    DEG(9,58,11) = 0
-    DEG(9,58,12) = 0
-  COEF(9,58) = (1.3508001213496954, 0)
-    DEG(9,59,1) = 0
-    DEG(9,59,2) = 1
-    DEG(9,59,3) = 0
-    DEG(9,59,4) = 0
-    DEG(9,59,5) = 0
-    DEG(9,59,6) = 1
-    DEG(9,59,7) = 0
-    DEG(9,59,8) = 1
-    DEG(9,59,9) = 0
-    DEG(9,59,10) = 0
-    DEG(9,59,11) = 0
-    DEG(9,59,12) = 0
-  COEF(9,59) = (-0.039688003668534214, 0)
-    DEG(9,60,1) = 0
-    DEG(9,60,2) = 0
-    DEG(9,60,3) = 1
-    DEG(9,60,4) = 0
-    DEG(9,60,5) = 0
-    DEG(9,60,6) = 1
-    DEG(9,60,7) = 0
-    DEG(9,60,8) = 1
-    DEG(9,60,9) = 0
-    DEG(9,60,10) = 0
-    DEG(9,60,11) = 0
-    DEG(9,60,12) = 0
-  COEF(9,60) = (-0.11443341447785497, 0)
-    DEG(9,61,1) = 0
-    DEG(9,61,2) = 0
-    DEG(9,61,3) = 0
-    DEG(9,61,4) = 1
-    DEG(9,61,5) = 0
-    DEG(9,61,6) = 1
-    DEG(9,61,7) = 0
-    DEG(9,61,8) = 1
-    DEG(9,61,9) = 0
-    DEG(9,61,10) = 0
-    DEG(9,61,11) = 0
-    DEG(9,61,12) = 0
-  COEF(9,61) = (-1.3508001213496954, 0)
-    DEG(9,62,1) = 0
-    DEG(9,62,2) = 0
-    DEG(9,62,3) = 0
-    DEG(9,62,4) = 0
-    DEG(9,62,5) = 1
-    DEG(9,62,6) = 1
-    DEG(9,62,7) = 0
-    DEG(9,62,8) = 1
-    DEG(9,62,9) = 0
-    DEG(9,62,10) = 0
-    DEG(9,62,11) = 0
-    DEG(9,62,12) = 0
-  COEF(9,62) = (0.039688003668534214, 0)
-    DEG(9,63,1) = 0
-    DEG(9,63,2) = 0
-    DEG(9,63,3) = 0
-    DEG(9,63,4) = 0
-    DEG(9,63,5) = 0
-    DEG(9,63,6) = 2
-    DEG(9,63,7) = 0
-    DEG(9,63,8) = 1
-    DEG(9,63,9) = 0
-    DEG(9,63,10) = 0
-    DEG(9,63,11) = 0
-    DEG(9,63,12) = 0
-  COEF(9,63) = (0.05721670723892749, 0)
-    DEG(9,64,1) = 1
-    DEG(9,64,2) = 0
-    DEG(9,64,3) = 0
-    DEG(9,64,4) = 1
-    DEG(9,64,5) = 0
-    DEG(9,64,6) = 0
-    DEG(9,64,7) = 1
-    DEG(9,64,8) = 1
-    DEG(9,64,9) = 0
-    DEG(9,64,10) = 0
-    DEG(9,64,11) = 0
-    DEG(9,64,12) = 0
-  COEF(9,64) = (-1.2883821077969642, 0)
-    DEG(9,65,1) = 0
-    DEG(9,65,2) = 1
-    DEG(9,65,3) = 0
-    DEG(9,65,4) = 1
-    DEG(9,65,5) = 0
-    DEG(9,65,6) = 0
-    DEG(9,65,7) = 1
-    DEG(9,65,8) = 1
-    DEG(9,65,9) = 0
-    DEG(9,65,10) = 0
-    DEG(9,65,11) = 0
-    DEG(9,65,12) = 0
-  COEF(9,65) = (-0.752413110966881, 0)
-    DEG(9,66,1) = 0
-    DEG(9,66,2) = 0
-    DEG(9,66,3) = 1
-    DEG(9,66,4) = 1
-    DEG(9,66,5) = 0
-    DEG(9,66,6) = 0
-    DEG(9,66,7) = 1
-    DEG(9,66,8) = 1
-    DEG(9,66,9) = 0
-    DEG(9,66,10) = 0
-    DEG(9,66,11) = 0
-    DEG(9,66,12) = 0
-  COEF(9,66) = (2.1011931781849453, 0)
-    DEG(9,67,1) = 0
-    DEG(9,67,2) = 0
-    DEG(9,67,3) = 0
-    DEG(9,67,4) = 2
-    DEG(9,67,5) = 0
-    DEG(9,67,6) = 0
-    DEG(9,67,7) = 1
-    DEG(9,67,8) = 1
-    DEG(9,67,9) = 0
-    DEG(9,67,10) = 0
-    DEG(9,67,11) = 0
-    DEG(9,67,12) = 0
-  COEF(9,67) = (0.6441910538984821, 0)
-    DEG(9,68,1) = 1
-    DEG(9,68,2) = 0
-    DEG(9,68,3) = 0
-    DEG(9,68,4) = 0
-    DEG(9,68,5) = 1
-    DEG(9,68,6) = 0
-    DEG(9,68,7) = 1
-    DEG(9,68,8) = 1
-    DEG(9,68,9) = 0
-    DEG(9,68,10) = 0
-    DEG(9,68,11) = 0
-    DEG(9,68,12) = 0
-  COEF(9,68) = (-0.752413110966881, 0)
-    DEG(9,69,1) = 0
-    DEG(9,69,2) = 1
-    DEG(9,69,3) = 0
-    DEG(9,69,4) = 0
-    DEG(9,69,5) = 1
-    DEG(9,69,6) = 0
-    DEG(9,69,7) = 1
-    DEG(9,69,8) = 1
-    DEG(9,69,9) = 0
-    DEG(9,69,10) = 0
-    DEG(9,69,11) = 0
-    DEG(9,69,12) = 0
-  COEF(9,69) = (1.2238086878196415, 0)
-    DEG(9,70,1) = 0
-    DEG(9,70,2) = 0
-    DEG(9,70,3) = 1
-    DEG(9,70,4) = 0
-    DEG(9,70,5) = 1
-    DEG(9,70,6) = 0
-    DEG(9,70,7) = 1
-    DEG(9,70,8) = 1
-    DEG(9,70,9) = 0
-    DEG(9,70,10) = 0
-    DEG(9,70,11) = 0
-    DEG(9,70,12) = 0
-  COEF(9,70) = (0.6160822177225644, 0)
-    DEG(9,71,1) = 0
-    DEG(9,71,2) = 0
-    DEG(9,71,3) = 0
-    DEG(9,71,4) = 1
-    DEG(9,71,5) = 1
-    DEG(9,71,6) = 0
-    DEG(9,71,7) = 1
-    DEG(9,71,8) = 1
-    DEG(9,71,9) = 0
-    DEG(9,71,10) = 0
-    DEG(9,71,11) = 0
-    DEG(9,71,12) = 0
-  COEF(9,71) = (0.752413110966881, 0)
-    DEG(9,72,1) = 0
-    DEG(9,72,2) = 0
-    DEG(9,72,3) = 0
-    DEG(9,72,4) = 0
-    DEG(9,72,5) = 2
-    DEG(9,72,6) = 0
-    DEG(9,72,7) = 1
-    DEG(9,72,8) = 1
-    DEG(9,72,9) = 0
-    DEG(9,72,10) = 0
-    DEG(9,72,11) = 0
-    DEG(9,72,12) = 0
-  COEF(9,72) = (-0.6119043439098207, 0)
-    DEG(9,73,1) = 1
-    DEG(9,73,2) = 0
-    DEG(9,73,3) = 0
-    DEG(9,73,4) = 0
-    DEG(9,73,5) = 0
-    DEG(9,73,6) = 1
-    DEG(9,73,7) = 1
-    DEG(9,73,8) = 1
-    DEG(9,73,9) = 0
-    DEG(9,73,10) = 0
-    DEG(9,73,11) = 0
-    DEG(9,73,12) = 0
-  COEF(9,73) = (2.1011931781849453, 0)
-    DEG(9,74,1) = 0
-    DEG(9,74,2) = 1
-    DEG(9,74,3) = 0
-    DEG(9,74,4) = 0
-    DEG(9,74,5) = 0
-    DEG(9,74,6) = 1
-    DEG(9,74,7) = 1
-    DEG(9,74,8) = 1
-    DEG(9,74,9) = 0
-    DEG(9,74,10) = 0
-    DEG(9,74,11) = 0
-    DEG(9,74,12) = 0
-  COEF(9,74) = (0.6160822177225644, 0)
-    DEG(9,75,1) = 0
-    DEG(9,75,2) = 0
-    DEG(9,75,3) = 1
-    DEG(9,75,4) = 0
-    DEG(9,75,5) = 0
-    DEG(9,75,6) = 1
-    DEG(9,75,7) = 1
-    DEG(9,75,8) = 1
-    DEG(9,75,9) = 0
-    DEG(9,75,10) = 0
-    DEG(9,75,11) = 0
-    DEG(9,75,12) = 0
-  COEF(9,75) = (0.06457341997732276, 0)
-    DEG(9,76,1) = 0
-    DEG(9,76,2) = 0
-    DEG(9,76,3) = 0
-    DEG(9,76,4) = 1
-    DEG(9,76,5) = 0
-    DEG(9,76,6) = 1
-    DEG(9,76,7) = 1
-    DEG(9,76,8) = 1
-    DEG(9,76,9) = 0
-    DEG(9,76,10) = 0
-    DEG(9,76,11) = 0
-    DEG(9,76,12) = 0
-  COEF(9,76) = (-2.1011931781849453, 0)
-    DEG(9,77,1) = 0
-    DEG(9,77,2) = 0
-    DEG(9,77,3) = 0
-    DEG(9,77,4) = 0
-    DEG(9,77,5) = 1
-    DEG(9,77,6) = 1
-    DEG(9,77,7) = 1
-    DEG(9,77,8) = 1
-    DEG(9,77,9) = 0
-    DEG(9,77,10) = 0
-    DEG(9,77,11) = 0
-    DEG(9,77,12) = 0
-  COEF(9,77) = (-0.6160822177225644, 0)
-    DEG(9,78,1) = 0
-    DEG(9,78,2) = 0
-    DEG(9,78,3) = 0
-    DEG(9,78,4) = 0
-    DEG(9,78,5) = 0
-    DEG(9,78,6) = 2
-    DEG(9,78,7) = 1
-    DEG(9,78,8) = 1
-    DEG(9,78,9) = 0
-    DEG(9,78,10) = 0
-    DEG(9,78,11) = 0
-    DEG(9,78,12) = 0
-  COEF(9,78) = (-0.03228670998866138, 0)
-    DEG(9,79,1) = 1
-    DEG(9,79,2) = 0
-    DEG(9,79,3) = 0
-    DEG(9,79,4) = 1
-    DEG(9,79,5) = 0
-    DEG(9,79,6) = 0
-    DEG(9,79,7) = 0
-    DEG(9,79,8) = 2
-    DEG(9,79,9) = 0
-    DEG(9,79,10) = 0
-    DEG(9,79,11) = 0
-    DEG(9,79,12) = 0
-  COEF(9,79) = (-0.7451453640923748, 0)
-    DEG(9,80,1) = 0
-    DEG(9,80,2) = 1
-    DEG(9,80,3) = 0
-    DEG(9,80,4) = 1
-    DEG(9,80,5) = 0
-    DEG(9,80,6) = 0
-    DEG(9,80,7) = 0
-    DEG(9,80,8) = 2
-    DEG(9,80,9) = 0
-    DEG(9,80,10) = 0
-    DEG(9,80,11) = 0
-    DEG(9,80,12) = 0
-  COEF(9,80) = (-1.050420697070612, 0)
-    DEG(9,81,1) = 0
-    DEG(9,81,2) = 0
-    DEG(9,81,3) = 1
-    DEG(9,81,4) = 1
-    DEG(9,81,5) = 0
-    DEG(9,81,6) = 0
-    DEG(9,81,7) = 0
-    DEG(9,81,8) = 2
-    DEG(9,81,9) = 0
-    DEG(9,81,10) = 0
-    DEG(9,81,11) = 0
-    DEG(9,81,12) = 0
-  COEF(9,81) = (0.6237372837009005, 0)
-    DEG(9,82,1) = 0
-    DEG(9,82,2) = 0
-    DEG(9,82,3) = 0
-    DEG(9,82,4) = 2
-    DEG(9,82,5) = 0
-    DEG(9,82,6) = 0
-    DEG(9,82,7) = 0
-    DEG(9,82,8) = 2
-    DEG(9,82,9) = 0
-    DEG(9,82,10) = 0
-    DEG(9,82,11) = 0
-    DEG(9,82,12) = 0
-  COEF(9,82) = (0.3725726820461874, 0)
-    DEG(9,83,1) = 1
-    DEG(9,83,2) = 0
-    DEG(9,83,3) = 0
-    DEG(9,83,4) = 0
-    DEG(9,83,5) = 1
-    DEG(9,83,6) = 0
-    DEG(9,83,7) = 0
-    DEG(9,83,8) = 2
-    DEG(9,83,9) = 0
-    DEG(9,83,10) = 0
-    DEG(9,83,11) = 0
-    DEG(9,83,12) = 0
-  COEF(9,83) = (-1.050420697070612, 0)
-    DEG(9,84,1) = 0
-    DEG(9,84,2) = 1
-    DEG(9,84,3) = 0
-    DEG(9,84,4) = 0
-    DEG(9,84,5) = 1
-    DEG(9,84,6) = 0
-    DEG(9,84,7) = 0
-    DEG(9,84,8) = 2
-    DEG(9,84,9) = 0
-    DEG(9,84,10) = 0
-    DEG(9,84,11) = 0
-    DEG(9,84,12) = 0
-  COEF(9,84) = (-0.7721643570051804, 0)
-    DEG(9,85,1) = 0
-    DEG(9,85,2) = 0
-    DEG(9,85,3) = 1
-    DEG(9,85,4) = 0
-    DEG(9,85,5) = 1
-    DEG(9,85,6) = 0
-    DEG(9,85,7) = 0
-    DEG(9,85,8) = 2
-    DEG(9,85,9) = 0
-    DEG(9,85,10) = 0
-    DEG(9,85,11) = 0
-    DEG(9,85,12) = 0
-  COEF(9,85) = (-0.32286223557195715, 0)
-    DEG(9,86,1) = 0
-    DEG(9,86,2) = 0
-    DEG(9,86,3) = 0
-    DEG(9,86,4) = 1
-    DEG(9,86,5) = 1
-    DEG(9,86,6) = 0
-    DEG(9,86,7) = 0
-    DEG(9,86,8) = 2
-    DEG(9,86,9) = 0
-    DEG(9,86,10) = 0
-    DEG(9,86,11) = 0
-    DEG(9,86,12) = 0
-  COEF(9,86) = (1.050420697070612, 0)
-    DEG(9,87,1) = 0
-    DEG(9,87,2) = 0
-    DEG(9,87,3) = 0
-    DEG(9,87,4) = 0
-    DEG(9,87,5) = 2
-    DEG(9,87,6) = 0
-    DEG(9,87,7) = 0
-    DEG(9,87,8) = 2
-    DEG(9,87,9) = 0
-    DEG(9,87,10) = 0
-    DEG(9,87,11) = 0
-    DEG(9,87,12) = 0
-  COEF(9,87) = (0.3860821785025902, 0)
-    DEG(9,88,1) = 1
-    DEG(9,88,2) = 0
-    DEG(9,88,3) = 0
-    DEG(9,88,4) = 0
-    DEG(9,88,5) = 0
-    DEG(9,88,6) = 1
-    DEG(9,88,7) = 0
-    DEG(9,88,8) = 2
-    DEG(9,88,9) = 0
-    DEG(9,88,10) = 0
-    DEG(9,88,11) = 0
-    DEG(9,88,12) = 0
-  COEF(9,88) = (0.6237372837009005, 0)
-    DEG(9,89,1) = 0
-    DEG(9,89,2) = 1
-    DEG(9,89,3) = 0
-    DEG(9,89,4) = 0
-    DEG(9,89,5) = 0
-    DEG(9,89,6) = 1
-    DEG(9,89,7) = 0
-    DEG(9,89,8) = 2
-    DEG(9,89,9) = 0
-    DEG(9,89,10) = 0
-    DEG(9,89,11) = 0
-    DEG(9,89,12) = 0
-  COEF(9,89) = (-0.32286223557195715, 0)
-    DEG(9,90,1) = 0
-    DEG(9,90,2) = 0
-    DEG(9,90,3) = 1
-    DEG(9,90,4) = 0
-    DEG(9,90,5) = 0
-    DEG(9,90,6) = 1
-    DEG(9,90,7) = 0
-    DEG(9,90,8) = 2
-    DEG(9,90,9) = 0
-    DEG(9,90,10) = 0
-    DEG(9,90,11) = 0
-    DEG(9,90,12) = 0
-  COEF(9,90) = (1.517309721097555, 0)
-    DEG(9,91,1) = 0
-    DEG(9,91,2) = 0
-    DEG(9,91,3) = 0
-    DEG(9,91,4) = 1
-    DEG(9,91,5) = 0
-    DEG(9,91,6) = 1
-    DEG(9,91,7) = 0
-    DEG(9,91,8) = 2
-    DEG(9,91,9) = 0
-    DEG(9,91,10) = 0
-    DEG(9,91,11) = 0
-    DEG(9,91,12) = 0
-  COEF(9,91) = (-0.6237372837009005, 0)
-    DEG(9,92,1) = 0
-    DEG(9,92,2) = 0
-    DEG(9,92,3) = 0
-    DEG(9,92,4) = 0
-    DEG(9,92,5) = 1
-    DEG(9,92,6) = 1
-    DEG(9,92,7) = 0
-    DEG(9,92,8) = 2
-    DEG(9,92,9) = 0
-    DEG(9,92,10) = 0
-    DEG(9,92,11) = 0
-    DEG(9,92,12) = 0
-  COEF(9,92) = (0.32286223557195715, 0)
-    DEG(9,93,1) = 0
-    DEG(9,93,2) = 0
-    DEG(9,93,3) = 0
-    DEG(9,93,4) = 0
-    DEG(9,93,5) = 0
-    DEG(9,93,6) = 2
-    DEG(9,93,7) = 0
-    DEG(9,93,8) = 2
-    DEG(9,93,9) = 0
-    DEG(9,93,10) = 0
-    DEG(9,93,11) = 0
-    DEG(9,93,12) = 0
-  COEF(9,93) = (-0.7586548605487775, 0)
-    DEG(9,94,1) = 0
-    DEG(9,94,2) = 0
-    DEG(9,94,3) = 0
-    DEG(9,94,4) = 0
-    DEG(9,94,5) = 0
-    DEG(9,94,6) = 0
-    DEG(9,94,7) = 0
-    DEG(9,94,8) = 0
-    DEG(9,94,9) = 1
-    DEG(9,94,10) = 0
-    DEG(9,94,11) = 0
-    DEG(9,94,12) = 0
-  COEF(9,94) = (-0.4266791616034836, 0)
-    DEG(9,95,1) = 1
-    DEG(9,95,2) = 0
-    DEG(9,95,3) = 0
-    DEG(9,95,4) = 1
-    DEG(9,95,5) = 0
-    DEG(9,95,6) = 0
-    DEG(9,95,7) = 0
-    DEG(9,95,8) = 0
-    DEG(9,95,9) = 1
-    DEG(9,95,10) = 0
-    DEG(9,95,11) = 0
-    DEG(9,95,12) = 0
-  COEF(9,95) = (1.9275426792826444, 0)
-    DEG(9,96,1) = 0
-    DEG(9,96,2) = 1
-    DEG(9,96,3) = 0
-    DEG(9,96,4) = 1
-    DEG(9,96,5) = 0
-    DEG(9,96,6) = 0
-    DEG(9,96,7) = 0
-    DEG(9,96,8) = 0
-    DEG(9,96,9) = 1
-    DEG(9,96,10) = 0
-    DEG(9,96,11) = 0
-    DEG(9,96,12) = 0
-  COEF(9,96) = (-1.8763927504259046, 0)
-    DEG(9,97,1) = 0
-    DEG(9,97,2) = 0
-    DEG(9,97,3) = 1
-    DEG(9,97,4) = 1
-    DEG(9,97,5) = 0
-    DEG(9,97,6) = 0
-    DEG(9,97,7) = 0
-    DEG(9,97,8) = 0
-    DEG(9,97,9) = 1
-    DEG(9,97,10) = 0
-    DEG(9,97,11) = 0
-    DEG(9,97,12) = 0
-  COEF(9,97) = (-0.7497409051947523, 0)
-    DEG(9,98,1) = 0
-    DEG(9,98,2) = 0
-    DEG(9,98,3) = 0
-    DEG(9,98,4) = 2
-    DEG(9,98,5) = 0
-    DEG(9,98,6) = 0
-    DEG(9,98,7) = 0
-    DEG(9,98,8) = 0
-    DEG(9,98,9) = 1
-    DEG(9,98,10) = 0
-    DEG(9,98,11) = 0
-    DEG(9,98,12) = 0
-  COEF(9,98) = (-0.9637713396413222, 0)
-    DEG(9,99,1) = 1
-    DEG(9,99,2) = 0
-    DEG(9,99,3) = 0
-    DEG(9,99,4) = 0
-    DEG(9,99,5) = 1
-    DEG(9,99,6) = 0
-    DEG(9,99,7) = 0
-    DEG(9,99,8) = 0
-    DEG(9,99,9) = 1
-    DEG(9,99,10) = 0
-    DEG(9,99,11) = 0
-    DEG(9,99,12) = 0
-  COEF(9,99) = (-1.8763927504259046, 0)
-    DEG(9,100,1) = 0
-    DEG(9,100,2) = 1
-    DEG(9,100,3) = 0
-    DEG(9,100,4) = 0
-    DEG(9,100,5) = 1
-    DEG(9,100,6) = 0
-    DEG(9,100,7) = 0
-    DEG(9,100,8) = 0
-    DEG(9,100,9) = 1
-    DEG(9,100,10) = 0
-    DEG(9,100,11) = 0
-    DEG(9,100,12) = 0
-  COEF(9,100) = (-0.22749667434461246, 0)
-    DEG(9,101,1) = 0
-    DEG(9,101,2) = 0
-    DEG(9,101,3) = 1
-    DEG(9,101,4) = 0
-    DEG(9,101,5) = 1
-    DEG(9,101,6) = 0
-    DEG(9,101,7) = 0
-    DEG(9,101,8) = 0
-    DEG(9,101,9) = 1
-    DEG(9,101,10) = 0
-    DEG(9,101,11) = 0
-    DEG(9,101,12) = 0
-  COEF(9,101) = (-1.1398201669580943, 0)
-    DEG(9,102,1) = 0
-    DEG(9,102,2) = 0
-    DEG(9,102,3) = 0
-    DEG(9,102,4) = 1
-    DEG(9,102,5) = 1
-    DEG(9,102,6) = 0
-    DEG(9,102,7) = 0
-    DEG(9,102,8) = 0
-    DEG(9,102,9) = 1
-    DEG(9,102,10) = 0
-    DEG(9,102,11) = 0
-    DEG(9,102,12) = 0
-  COEF(9,102) = (1.8763927504259046, 0)
-    DEG(9,103,1) = 0
-    DEG(9,103,2) = 0
-    DEG(9,103,3) = 0
-    DEG(9,103,4) = 0
-    DEG(9,103,5) = 2
-    DEG(9,103,6) = 0
-    DEG(9,103,7) = 0
-    DEG(9,103,8) = 0
-    DEG(9,103,9) = 1
-    DEG(9,103,10) = 0
-    DEG(9,103,11) = 0
-    DEG(9,103,12) = 0
-  COEF(9,103) = (0.11374833717230623, 0)
-    DEG(9,104,1) = 1
-    DEG(9,104,2) = 0
-    DEG(9,104,3) = 0
-    DEG(9,104,4) = 0
-    DEG(9,104,5) = 0
-    DEG(9,104,6) = 1
-    DEG(9,104,7) = 0
-    DEG(9,104,8) = 0
-    DEG(9,104,9) = 1
-    DEG(9,104,10) = 0
-    DEG(9,104,11) = 0
-    DEG(9,104,12) = 0
-  COEF(9,104) = (-0.7497409051947523, 0)
-    DEG(9,105,1) = 0
-    DEG(9,105,2) = 1
-    DEG(9,105,3) = 0
-    DEG(9,105,4) = 0
-    DEG(9,105,5) = 0
-    DEG(9,105,6) = 1
-    DEG(9,105,7) = 0
-    DEG(9,105,8) = 0
-    DEG(9,105,9) = 1
-    DEG(9,105,10) = 0
-    DEG(9,105,11) = 0
-    DEG(9,105,12) = 0
-  COEF(9,105) = (-1.1398201669580943, 0)
-    DEG(9,106,1) = 0
-    DEG(9,106,2) = 0
-    DEG(9,106,3) = 1
-    DEG(9,106,4) = 0
-    DEG(9,106,5) = 0
-    DEG(9,106,6) = 1
-    DEG(9,106,7) = 0
-    DEG(9,106,8) = 0
-    DEG(9,106,9) = 1
-    DEG(9,106,10) = 0
-    DEG(9,106,11) = 0
-    DEG(9,106,12) = 0
-  COEF(9,106) = (-0.8466876817310647, 0)
-    DEG(9,107,1) = 0
-    DEG(9,107,2) = 0
-    DEG(9,107,3) = 0
-    DEG(9,107,4) = 1
-    DEG(9,107,5) = 0
-    DEG(9,107,6) = 1
-    DEG(9,107,7) = 0
-    DEG(9,107,8) = 0
-    DEG(9,107,9) = 1
-    DEG(9,107,10) = 0
-    DEG(9,107,11) = 0
-    DEG(9,107,12) = 0
-  COEF(9,107) = (0.7497409051947523, 0)
-    DEG(9,108,1) = 0
-    DEG(9,108,2) = 0
-    DEG(9,108,3) = 0
-    DEG(9,108,4) = 0
-    DEG(9,108,5) = 1
-    DEG(9,108,6) = 1
-    DEG(9,108,7) = 0
-    DEG(9,108,8) = 0
-    DEG(9,108,9) = 1
-    DEG(9,108,10) = 0
-    DEG(9,108,11) = 0
-    DEG(9,108,12) = 0
-  COEF(9,108) = (1.1398201669580943, 0)
-    DEG(9,109,1) = 0
-    DEG(9,109,2) = 0
-    DEG(9,109,3) = 0
-    DEG(9,109,4) = 0
-    DEG(9,109,5) = 0
-    DEG(9,109,6) = 2
-    DEG(9,109,7) = 0
-    DEG(9,109,8) = 0
-    DEG(9,109,9) = 1
-    DEG(9,109,10) = 0
-    DEG(9,109,11) = 0
-    DEG(9,109,12) = 0
-  COEF(9,109) = (0.42334384086553234, 0)
-    DEG(9,110,1) = 1
-    DEG(9,110,2) = 0
-    DEG(9,110,3) = 0
-    DEG(9,110,4) = 1
-    DEG(9,110,5) = 0
-    DEG(9,110,6) = 0
-    DEG(9,110,7) = 1
-    DEG(9,110,8) = 0
-    DEG(9,110,9) = 1
-    DEG(9,110,10) = 0
-    DEG(9,110,11) = 0
-    DEG(9,110,12) = 0
-  COEF(9,110) = (0.8778624514060422, 0)
-    DEG(9,111,1) = 0
-    DEG(9,111,2) = 1
-    DEG(9,111,3) = 0
-    DEG(9,111,4) = 1
-    DEG(9,111,5) = 0
-    DEG(9,111,6) = 0
-    DEG(9,111,7) = 1
-    DEG(9,111,8) = 0
-    DEG(9,111,9) = 1
-    DEG(9,111,10) = 0
-    DEG(9,111,11) = 0
-    DEG(9,111,12) = 0
-  COEF(9,111) = (-0.8433767979749593, 0)
-    DEG(9,112,1) = 0
-    DEG(9,112,2) = 0
-    DEG(9,112,3) = 1
-    DEG(9,112,4) = 1
-    DEG(9,112,5) = 0
-    DEG(9,112,6) = 0
-    DEG(9,112,7) = 1
-    DEG(9,112,8) = 0
-    DEG(9,112,9) = 1
-    DEG(9,112,10) = 0
-    DEG(9,112,11) = 0
-    DEG(9,112,12) = 0
-  COEF(9,112) = (-2.0710984148318143, 0)
-    DEG(9,113,1) = 0
-    DEG(9,113,2) = 0
-    DEG(9,113,3) = 0
-    DEG(9,113,4) = 2
-    DEG(9,113,5) = 0
-    DEG(9,113,6) = 0
-    DEG(9,113,7) = 1
-    DEG(9,113,8) = 0
-    DEG(9,113,9) = 1
-    DEG(9,113,10) = 0
-    DEG(9,113,11) = 0
-    DEG(9,113,12) = 0
-  COEF(9,113) = (-0.4389312257030211, 0)
-    DEG(9,114,1) = 1
-    DEG(9,114,2) = 0
-    DEG(9,114,3) = 0
-    DEG(9,114,4) = 0
-    DEG(9,114,5) = 1
-    DEG(9,114,6) = 0
-    DEG(9,114,7) = 1
-    DEG(9,114,8) = 0
-    DEG(9,114,9) = 1
-    DEG(9,114,10) = 0
-    DEG(9,114,11) = 0
-    DEG(9,114,12) = 0
-  COEF(9,114) = (-0.8433767979749593, 0)
-    DEG(9,115,1) = 0
-    DEG(9,115,2) = 1
-    DEG(9,115,3) = 0
-    DEG(9,115,4) = 0
-    DEG(9,115,5) = 1
-    DEG(9,115,6) = 0
-    DEG(9,115,7) = 1
-    DEG(9,115,8) = 0
-    DEG(9,115,9) = 1
-    DEG(9,115,10) = 0
-    DEG(9,115,11) = 0
-    DEG(9,115,12) = 0
-  COEF(9,115) = (-1.1464326237053324, 0)
-    DEG(9,116,1) = 0
-    DEG(9,116,2) = 0
-    DEG(9,116,3) = 1
-    DEG(9,116,4) = 0
-    DEG(9,116,5) = 1
-    DEG(9,116,6) = 0
-    DEG(9,116,7) = 1
-    DEG(9,116,8) = 0
-    DEG(9,116,9) = 1
-    DEG(9,116,10) = 0
-    DEG(9,116,11) = 0
-    DEG(9,116,12) = 0
-  COEF(9,116) = (0.8476904597168985, 0)
-    DEG(9,117,1) = 0
-    DEG(9,117,2) = 0
-    DEG(9,117,3) = 0
-    DEG(9,117,4) = 1
-    DEG(9,117,5) = 1
-    DEG(9,117,6) = 0
-    DEG(9,117,7) = 1
-    DEG(9,117,8) = 0
-    DEG(9,117,9) = 1
-    DEG(9,117,10) = 0
-    DEG(9,117,11) = 0
-    DEG(9,117,12) = 0
-  COEF(9,117) = (0.8433767979749593, 0)
-    DEG(9,118,1) = 0
-    DEG(9,118,2) = 0
-    DEG(9,118,3) = 0
-    DEG(9,118,4) = 0
-    DEG(9,118,5) = 2
-    DEG(9,118,6) = 0
-    DEG(9,118,7) = 1
-    DEG(9,118,8) = 0
-    DEG(9,118,9) = 1
-    DEG(9,118,10) = 0
-    DEG(9,118,11) = 0
-    DEG(9,118,12) = 0
-  COEF(9,118) = (0.5732163118526662, 0)
-    DEG(9,119,1) = 1
-    DEG(9,119,2) = 0
-    DEG(9,119,3) = 0
-    DEG(9,119,4) = 0
-    DEG(9,119,5) = 0
-    DEG(9,119,6) = 1
-    DEG(9,119,7) = 1
-    DEG(9,119,8) = 0
-    DEG(9,119,9) = 1
-    DEG(9,119,10) = 0
-    DEG(9,119,11) = 0
-    DEG(9,119,12) = 0
-  COEF(9,119) = (-2.0710984148318143, 0)
-    DEG(9,120,1) = 0
-    DEG(9,120,2) = 1
-    DEG(9,120,3) = 0
-    DEG(9,120,4) = 0
-    DEG(9,120,5) = 0
-    DEG(9,120,6) = 1
-    DEG(9,120,7) = 1
-    DEG(9,120,8) = 0
-    DEG(9,120,9) = 1
-    DEG(9,120,10) = 0
-    DEG(9,120,11) = 0
-    DEG(9,120,12) = 0
-  COEF(9,120) = (0.8476904597168985, 0)
-    DEG(9,121,1) = 0
-    DEG(9,121,2) = 0
-    DEG(9,121,3) = 1
-    DEG(9,121,4) = 0
-    DEG(9,121,5) = 0
-    DEG(9,121,6) = 1
-    DEG(9,121,7) = 1
-    DEG(9,121,8) = 0
-    DEG(9,121,9) = 1
-    DEG(9,121,10) = 0
-    DEG(9,121,11) = 0
-    DEG(9,121,12) = 0
-  COEF(9,121) = (0.2685701722992902, 0)
-    DEG(9,122,1) = 0
-    DEG(9,122,2) = 0
-    DEG(9,122,3) = 0
-    DEG(9,122,4) = 1
-    DEG(9,122,5) = 0
-    DEG(9,122,6) = 1
-    DEG(9,122,7) = 1
-    DEG(9,122,8) = 0
-    DEG(9,122,9) = 1
-    DEG(9,122,10) = 0
-    DEG(9,122,11) = 0
-    DEG(9,122,12) = 0
-  COEF(9,122) = (2.0710984148318143, 0)
-    DEG(9,123,1) = 0
-    DEG(9,123,2) = 0
-    DEG(9,123,3) = 0
-    DEG(9,123,4) = 0
-    DEG(9,123,5) = 1
-    DEG(9,123,6) = 1
-    DEG(9,123,7) = 1
-    DEG(9,123,8) = 0
-    DEG(9,123,9) = 1
-    DEG(9,123,10) = 0
-    DEG(9,123,11) = 0
-    DEG(9,123,12) = 0
-  COEF(9,123) = (-0.8476904597168985, 0)
-    DEG(9,124,1) = 0
-    DEG(9,124,2) = 0
-    DEG(9,124,3) = 0
-    DEG(9,124,4) = 0
-    DEG(9,124,5) = 0
-    DEG(9,124,6) = 2
-    DEG(9,124,7) = 1
-    DEG(9,124,8) = 0
-    DEG(9,124,9) = 1
-    DEG(9,124,10) = 0
-    DEG(9,124,11) = 0
-    DEG(9,124,12) = 0
-  COEF(9,124) = (-0.1342850861496451, 0)
-    DEG(9,125,1) = 1
-    DEG(9,125,2) = 0
-    DEG(9,125,3) = 0
-    DEG(9,125,4) = 1
-    DEG(9,125,5) = 0
-    DEG(9,125,6) = 0
-    DEG(9,125,7) = 0
-    DEG(9,125,8) = 1
-    DEG(9,125,9) = 1
-    DEG(9,125,10) = 0
-    DEG(9,125,11) = 0
-    DEG(9,125,12) = 0
-  COEF(9,125) = (-0.30385331000268123, 0)
-    DEG(9,126,1) = 0
-    DEG(9,126,2) = 1
-    DEG(9,126,3) = 0
-    DEG(9,126,4) = 1
-    DEG(9,126,5) = 0
-    DEG(9,126,6) = 0
-    DEG(9,126,7) = 0
-    DEG(9,126,8) = 1
-    DEG(9,126,9) = 1
-    DEG(9,126,10) = 0
-    DEG(9,126,11) = 0
-    DEG(9,126,12) = 0
-  COEF(9,126) = (-1.120783953762706, 0)
-    DEG(9,127,1) = 0
-    DEG(9,127,2) = 0
-    DEG(9,127,3) = 1
-    DEG(9,127,4) = 1
-    DEG(9,127,5) = 0
-    DEG(9,127,6) = 0
-    DEG(9,127,7) = 0
-    DEG(9,127,8) = 1
-    DEG(9,127,9) = 1
-    DEG(9,127,10) = 0
-    DEG(9,127,11) = 0
-    DEG(9,127,12) = 0
-  COEF(9,127) = (-0.416319044252914, 0)
-    DEG(9,128,1) = 0
-    DEG(9,128,2) = 0
-    DEG(9,128,3) = 0
-    DEG(9,128,4) = 2
-    DEG(9,128,5) = 0
-    DEG(9,128,6) = 0
-    DEG(9,128,7) = 0
-    DEG(9,128,8) = 1
-    DEG(9,128,9) = 1
-    DEG(9,128,10) = 0
-    DEG(9,128,11) = 0
-    DEG(9,128,12) = 0
-  COEF(9,128) = (0.15192665500134062, 0)
-    DEG(9,129,1) = 1
-    DEG(9,129,2) = 0
-    DEG(9,129,3) = 0
-    DEG(9,129,4) = 0
-    DEG(9,129,5) = 1
-    DEG(9,129,6) = 0
-    DEG(9,129,7) = 0
-    DEG(9,129,8) = 1
-    DEG(9,129,9) = 1
-    DEG(9,129,10) = 0
-    DEG(9,129,11) = 0
-    DEG(9,129,12) = 0
-  COEF(9,129) = (-1.120783953762706, 0)
-    DEG(9,130,1) = 0
-    DEG(9,130,2) = 1
-    DEG(9,130,3) = 0
-    DEG(9,130,4) = 0
-    DEG(9,130,5) = 1
-    DEG(9,130,6) = 0
-    DEG(9,130,7) = 0
-    DEG(9,130,8) = 1
-    DEG(9,130,9) = 1
-    DEG(9,130,10) = 0
-    DEG(9,130,11) = 0
-    DEG(9,130,12) = 0
-  COEF(9,130) = (0.825403179992848, 0)
-    DEG(9,131,1) = 0
-    DEG(9,131,2) = 0
-    DEG(9,131,3) = 1
-    DEG(9,131,4) = 0
-    DEG(9,131,5) = 1
-    DEG(9,131,6) = 0
-    DEG(9,131,7) = 0
-    DEG(9,131,8) = 1
-    DEG(9,131,9) = 1
-    DEG(9,131,10) = 0
-    DEG(9,131,11) = 0
-    DEG(9,131,12) = 0
-  COEF(9,131) = (-2.4537193145409453, 0)
-    DEG(9,132,1) = 0
-    DEG(9,132,2) = 0
-    DEG(9,132,3) = 0
-    DEG(9,132,4) = 1
-    DEG(9,132,5) = 1
-    DEG(9,132,6) = 0
-    DEG(9,132,7) = 0
-    DEG(9,132,8) = 1
-    DEG(9,132,9) = 1
-    DEG(9,132,10) = 0
-    DEG(9,132,11) = 0
-    DEG(9,132,12) = 0
-  COEF(9,132) = (1.120783953762706, 0)
-    DEG(9,133,1) = 0
-    DEG(9,133,2) = 0
-    DEG(9,133,3) = 0
-    DEG(9,133,4) = 0
-    DEG(9,133,5) = 2
-    DEG(9,133,6) = 0
-    DEG(9,133,7) = 0
-    DEG(9,133,8) = 1
-    DEG(9,133,9) = 1
-    DEG(9,133,10) = 0
-    DEG(9,133,11) = 0
-    DEG(9,133,12) = 0
-  COEF(9,133) = (-0.412701589996424, 0)
-    DEG(9,134,1) = 1
-    DEG(9,134,2) = 0
-    DEG(9,134,3) = 0
-    DEG(9,134,4) = 0
-    DEG(9,134,5) = 0
-    DEG(9,134,6) = 1
-    DEG(9,134,7) = 0
-    DEG(9,134,8) = 1
-    DEG(9,134,9) = 1
-    DEG(9,134,10) = 0
-    DEG(9,134,11) = 0
-    DEG(9,134,12) = 0
-  COEF(9,134) = (-0.416319044252914, 0)
-    DEG(9,135,1) = 0
-    DEG(9,135,2) = 1
-    DEG(9,135,3) = 0
-    DEG(9,135,4) = 0
-    DEG(9,135,5) = 0
-    DEG(9,135,6) = 1
-    DEG(9,135,7) = 0
-    DEG(9,135,8) = 1
-    DEG(9,135,9) = 1
-    DEG(9,135,10) = 0
-    DEG(9,135,11) = 0
-    DEG(9,135,12) = 0
-  COEF(9,135) = (-2.4537193145409453, 0)
-    DEG(9,136,1) = 0
-    DEG(9,136,2) = 0
-    DEG(9,136,3) = 1
-    DEG(9,136,4) = 0
-    DEG(9,136,5) = 0
-    DEG(9,136,6) = 1
-    DEG(9,136,7) = 0
-    DEG(9,136,8) = 1
-    DEG(9,136,9) = 1
-    DEG(9,136,10) = 0
-    DEG(9,136,11) = 0
-    DEG(9,136,12) = 0
-  COEF(9,136) = (-0.5215498699901667, 0)
-    DEG(9,137,1) = 0
-    DEG(9,137,2) = 0
-    DEG(9,137,3) = 0
-    DEG(9,137,4) = 1
-    DEG(9,137,5) = 0
-    DEG(9,137,6) = 1
-    DEG(9,137,7) = 0
-    DEG(9,137,8) = 1
-    DEG(9,137,9) = 1
-    DEG(9,137,10) = 0
-    DEG(9,137,11) = 0
-    DEG(9,137,12) = 0
-  COEF(9,137) = (0.416319044252914, 0)
-    DEG(9,138,1) = 0
-    DEG(9,138,2) = 0
-    DEG(9,138,3) = 0
-    DEG(9,138,4) = 0
-    DEG(9,138,5) = 1
-    DEG(9,138,6) = 1
-    DEG(9,138,7) = 0
-    DEG(9,138,8) = 1
-    DEG(9,138,9) = 1
-    DEG(9,138,10) = 0
-    DEG(9,138,11) = 0
-    DEG(9,138,12) = 0
-  COEF(9,138) = (2.4537193145409453, 0)
-    DEG(9,139,1) = 0
-    DEG(9,139,2) = 0
-    DEG(9,139,3) = 0
-    DEG(9,139,4) = 0
-    DEG(9,139,5) = 0
-    DEG(9,139,6) = 2
-    DEG(9,139,7) = 0
-    DEG(9,139,8) = 1
-    DEG(9,139,9) = 1
-    DEG(9,139,10) = 0
-    DEG(9,139,11) = 0
-    DEG(9,139,12) = 0
-  COEF(9,139) = (0.26077493499508336, 0)
-    DEG(9,140,1) = 1
-    DEG(9,140,2) = 0
-    DEG(9,140,3) = 0
-    DEG(9,140,4) = 1
-    DEG(9,140,5) = 0
-    DEG(9,140,6) = 0
-    DEG(9,140,7) = 0
-    DEG(9,140,8) = 0
-    DEG(9,140,9) = 2
-    DEG(9,140,10) = 0
-    DEG(9,140,11) = 0
-    DEG(9,140,12) = 0
-  COEF(9,140) = (0.2905299557855074, 0)
-    DEG(9,141,1) = 0
-    DEG(9,141,2) = 1
-    DEG(9,141,3) = 0
-    DEG(9,141,4) = 1
-    DEG(9,141,5) = 0
-    DEG(9,141,6) = 0
-    DEG(9,141,7) = 0
-    DEG(9,141,8) = 0
-    DEG(9,141,9) = 2
-    DEG(9,141,10) = 0
-    DEG(9,141,11) = 0
-    DEG(9,141,12) = 0
-  COEF(9,141) = (-0.7731743302136183, 0)
-    DEG(9,142,1) = 0
-    DEG(9,142,2) = 0
-    DEG(9,142,3) = 1
-    DEG(9,142,4) = 1
-    DEG(9,142,5) = 0
-    DEG(9,142,6) = 0
-    DEG(9,142,7) = 0
-    DEG(9,142,8) = 0
-    DEG(9,142,9) = 2
-    DEG(9,142,10) = 0
-    DEG(9,142,11) = 0
-    DEG(9,142,12) = 0
-  COEF(9,142) = (-0.8292038031087149, 0)
-    DEG(9,143,1) = 0
-    DEG(9,143,2) = 0
-    DEG(9,143,3) = 0
-    DEG(9,143,4) = 2
-    DEG(9,143,5) = 0
-    DEG(9,143,6) = 0
-    DEG(9,143,7) = 0
-    DEG(9,143,8) = 0
-    DEG(9,143,9) = 2
-    DEG(9,143,10) = 0
-    DEG(9,143,11) = 0
-    DEG(9,143,12) = 0
-  COEF(9,143) = (-0.1452649778927537, 0)
-    DEG(9,144,1) = 1
-    DEG(9,144,2) = 0
-    DEG(9,144,3) = 0
-    DEG(9,144,4) = 0
-    DEG(9,144,5) = 1
-    DEG(9,144,6) = 0
-    DEG(9,144,7) = 0
-    DEG(9,144,8) = 0
-    DEG(9,144,9) = 2
-    DEG(9,144,10) = 0
-    DEG(9,144,11) = 0
-    DEG(9,144,12) = 0
-  COEF(9,144) = (-0.7731743302136183, 0)
-    DEG(9,145,1) = 0
-    DEG(9,145,2) = 1
-    DEG(9,145,3) = 0
-    DEG(9,145,4) = 0
-    DEG(9,145,5) = 1
-    DEG(9,145,6) = 0
-    DEG(9,145,7) = 0
-    DEG(9,145,8) = 0
-    DEG(9,145,9) = 2
-    DEG(9,145,10) = 0
-    DEG(9,145,11) = 0
-    DEG(9,145,12) = 0
-  COEF(9,145) = (1.2148532238545153, 0)
-    DEG(9,146,1) = 0
-    DEG(9,146,2) = 0
-    DEG(9,146,3) = 1
-    DEG(9,146,4) = 0
-    DEG(9,146,5) = 1
-    DEG(9,146,6) = 0
-    DEG(9,146,7) = 0
-    DEG(9,146,8) = 0
-    DEG(9,146,9) = 2
-    DEG(9,146,10) = 0
-    DEG(9,146,11) = 0
-    DEG(9,146,12) = 0
-  COEF(9,146) = (0.40029343116989446, 0)
-    DEG(9,147,1) = 0
-    DEG(9,147,2) = 0
-    DEG(9,147,3) = 0
-    DEG(9,147,4) = 1
-    DEG(9,147,5) = 1
-    DEG(9,147,6) = 0
-    DEG(9,147,7) = 0
-    DEG(9,147,8) = 0
-    DEG(9,147,9) = 2
-    DEG(9,147,10) = 0
-    DEG(9,147,11) = 0
-    DEG(9,147,12) = 0
-  COEF(9,147) = (0.7731743302136183, 0)
-    DEG(9,148,1) = 0
-    DEG(9,148,2) = 0
-    DEG(9,148,3) = 0
-    DEG(9,148,4) = 0
-    DEG(9,148,5) = 2
-    DEG(9,148,6) = 0
-    DEG(9,148,7) = 0
-    DEG(9,148,8) = 0
-    DEG(9,148,9) = 2
-    DEG(9,148,10) = 0
-    DEG(9,148,11) = 0
-    DEG(9,148,12) = 0
-  COEF(9,148) = (-0.6074266119272577, 0)
-    DEG(9,149,1) = 1
-    DEG(9,149,2) = 0
-    DEG(9,149,3) = 0
-    DEG(9,149,4) = 0
-    DEG(9,149,5) = 0
-    DEG(9,149,6) = 1
-    DEG(9,149,7) = 0
-    DEG(9,149,8) = 0
-    DEG(9,149,9) = 2
-    DEG(9,149,10) = 0
-    DEG(9,149,11) = 0
-    DEG(9,149,12) = 0
-  COEF(9,149) = (-0.8292038031087149, 0)
-    DEG(9,150,1) = 0
-    DEG(9,150,2) = 1
-    DEG(9,150,3) = 0
-    DEG(9,150,4) = 0
-    DEG(9,150,5) = 0
-    DEG(9,150,6) = 1
-    DEG(9,150,7) = 0
-    DEG(9,150,8) = 0
-    DEG(9,150,9) = 2
-    DEG(9,150,10) = 0
-    DEG(9,150,11) = 0
-    DEG(9,150,12) = 0
-  COEF(9,150) = (0.40029343116989446, 0)
-    DEG(9,151,1) = 0
-    DEG(9,151,2) = 0
-    DEG(9,151,3) = 1
-    DEG(9,151,4) = 0
-    DEG(9,151,5) = 0
-    DEG(9,151,6) = 1
-    DEG(9,151,7) = 0
-    DEG(9,151,8) = 0
-    DEG(9,151,9) = 2
-    DEG(9,151,10) = 0
-    DEG(9,151,11) = 0
-    DEG(9,151,12) = 0
-  COEF(9,151) = (-1.5053831796400228, 0)
-    DEG(9,152,1) = 0
-    DEG(9,152,2) = 0
-    DEG(9,152,3) = 0
-    DEG(9,152,4) = 1
-    DEG(9,152,5) = 0
-    DEG(9,152,6) = 1
-    DEG(9,152,7) = 0
-    DEG(9,152,8) = 0
-    DEG(9,152,9) = 2
-    DEG(9,152,10) = 0
-    DEG(9,152,11) = 0
-    DEG(9,152,12) = 0
-  COEF(9,152) = (0.8292038031087149, 0)
-    DEG(9,153,1) = 0
-    DEG(9,153,2) = 0
-    DEG(9,153,3) = 0
-    DEG(9,153,4) = 0
-    DEG(9,153,5) = 1
-    DEG(9,153,6) = 1
-    DEG(9,153,7) = 0
-    DEG(9,153,8) = 0
-    DEG(9,153,9) = 2
-    DEG(9,153,10) = 0
-    DEG(9,153,11) = 0
-    DEG(9,153,12) = 0
-  COEF(9,153) = (-0.40029343116989446, 0)
-    DEG(9,154,1) = 0
-    DEG(9,154,2) = 0
-    DEG(9,154,3) = 0
-    DEG(9,154,4) = 0
-    DEG(9,154,5) = 0
-    DEG(9,154,6) = 2
-    DEG(9,154,7) = 0
-    DEG(9,154,8) = 0
-    DEG(9,154,9) = 2
-    DEG(9,154,10) = 0
-    DEG(9,154,11) = 0
-    DEG(9,154,12) = 0
-  COEF(9,154) = (0.7526915898200114, 0)
-    DEG(9,155,1) = 0
-    DEG(9,155,2) = 0
-    DEG(9,155,3) = 0
-    DEG(9,155,4) = 0
-    DEG(9,155,5) = 0
-    DEG(9,155,6) = 0
-    DEG(9,155,7) = 0
-    DEG(9,155,8) = 0
-    DEG(9,155,9) = 0
-    DEG(9,155,10) = 1
-    DEG(9,155,11) = 0
-    DEG(9,155,12) = 0
-  COEF(9,155) = (-2.2943850750363817, 0)
-    DEG(9,156,1) = 1
-    DEG(9,156,2) = 0
-    DEG(9,156,3) = 0
-    DEG(9,156,4) = 1
-    DEG(9,156,5) = 0
-    DEG(9,156,6) = 0
-    DEG(9,156,7) = 0
-    DEG(9,156,8) = 0
-    DEG(9,156,9) = 0
-    DEG(9,156,10) = 1
-    DEG(9,156,11) = 0
-    DEG(9,156,12) = 0
-  COEF(9,156) = (2.2943850750363817, 0)
-    DEG(9,157,1) = 1
-    DEG(9,157,2) = 0
-    DEG(9,157,3) = 0
-    DEG(9,157,4) = 0
-    DEG(9,157,5) = 1
-    DEG(9,157,6) = 0
-    DEG(9,157,7) = 0
-    DEG(9,157,8) = 0
-    DEG(9,157,9) = 0
-    DEG(9,157,10) = 1
-    DEG(9,157,11) = 0
-    DEG(9,157,12) = 0
-  COEF(9,157) = (-1.4008775248719703, 0)
-    DEG(9,158,1) = 1
-    DEG(9,158,2) = 0
-    DEG(9,158,3) = 0
-    DEG(9,158,4) = 0
-    DEG(9,158,5) = 0
-    DEG(9,158,6) = 1
-    DEG(9,158,7) = 0
-    DEG(9,158,8) = 0
-    DEG(9,158,9) = 0
-    DEG(9,158,10) = 1
-    DEG(9,158,11) = 0
-    DEG(9,158,12) = 0
-  COEF(9,158) = (-0.7463601933544903, 0)
-    DEG(9,159,1) = 0
-    DEG(9,159,2) = 0
-    DEG(9,159,3) = 0
-    DEG(9,159,4) = 0
-    DEG(9,159,5) = 0
-    DEG(9,159,6) = 0
-    DEG(9,159,7) = 1
-    DEG(9,159,8) = 0
-    DEG(9,159,9) = 0
-    DEG(9,159,10) = 1
-    DEG(9,159,11) = 0
-    DEG(9,159,12) = 0
-  COEF(9,159) = (-0.28127037862407506, 0)
-    DEG(9,160,1) = 1
-    DEG(9,160,2) = 0
-    DEG(9,160,3) = 0
-    DEG(9,160,4) = 1
-    DEG(9,160,5) = 0
-    DEG(9,160,6) = 0
-    DEG(9,160,7) = 1
-    DEG(9,160,8) = 0
-    DEG(9,160,9) = 0
-    DEG(9,160,10) = 1
-    DEG(9,160,11) = 0
-    DEG(9,160,12) = 0
-  COEF(9,160) = (0.28127037862407506, 0)
-    DEG(9,161,1) = 1
-    DEG(9,161,2) = 0
-    DEG(9,161,3) = 0
-    DEG(9,161,4) = 0
-    DEG(9,161,5) = 1
-    DEG(9,161,6) = 0
-    DEG(9,161,7) = 1
-    DEG(9,161,8) = 0
-    DEG(9,161,9) = 0
-    DEG(9,161,10) = 1
-    DEG(9,161,11) = 0
-    DEG(9,161,12) = 0
-  COEF(9,161) = (2.2901536795293533, 0)
-    DEG(9,162,1) = 1
-    DEG(9,162,2) = 0
-    DEG(9,162,3) = 0
-    DEG(9,162,4) = 0
-    DEG(9,162,5) = 0
-    DEG(9,162,6) = 1
-    DEG(9,162,7) = 1
-    DEG(9,162,8) = 0
-    DEG(9,162,9) = 0
-    DEG(9,162,10) = 1
-    DEG(9,162,11) = 0
-    DEG(9,162,12) = 0
-  COEF(9,162) = (0.26216092668309676, 0)
-    DEG(9,163,1) = 0
-    DEG(9,163,2) = 0
-    DEG(9,163,3) = 0
-    DEG(9,163,4) = 0
-    DEG(9,163,5) = 0
-    DEG(9,163,6) = 0
-    DEG(9,163,7) = 0
-    DEG(9,163,8) = 1
-    DEG(9,163,9) = 0
-    DEG(9,163,10) = 1
-    DEG(9,163,11) = 0
-    DEG(9,163,12) = 0
-  COEF(9,163) = (0.9357034495118564, 0)
-    DEG(9,164,1) = 1
-    DEG(9,164,2) = 0
-    DEG(9,164,3) = 0
-    DEG(9,164,4) = 1
-    DEG(9,164,5) = 0
-    DEG(9,164,6) = 0
-    DEG(9,164,7) = 0
-    DEG(9,164,8) = 1
-    DEG(9,164,9) = 0
-    DEG(9,164,10) = 1
-    DEG(9,164,11) = 0
-    DEG(9,164,12) = 0
-  COEF(9,164) = (-0.9357034495118564, 0)
-    DEG(9,165,1) = 1
-    DEG(9,165,2) = 0
-    DEG(9,165,3) = 0
-    DEG(9,165,4) = 0
-    DEG(9,165,5) = 1
-    DEG(9,165,6) = 0
-    DEG(9,165,7) = 0
-    DEG(9,165,8) = 1
-    DEG(9,165,9) = 0
-    DEG(9,165,10) = 1
-    DEG(9,165,11) = 0
-    DEG(9,165,12) = 0
-  COEF(9,165) = (-2.2315161625197155, 0)
-    DEG(9,166,1) = 1
-    DEG(9,166,2) = 0
-    DEG(9,166,3) = 0
-    DEG(9,166,4) = 0
-    DEG(9,166,5) = 0
-    DEG(9,166,6) = 1
-    DEG(9,166,7) = 0
-    DEG(9,166,8) = 1
-    DEG(9,166,9) = 0
-    DEG(9,166,10) = 1
-    DEG(9,166,11) = 0
-    DEG(9,166,12) = 0
-  COEF(9,166) = (2.3312478082177184, 0)
-    DEG(9,167,1) = 0
-    DEG(9,167,2) = 0
-    DEG(9,167,3) = 0
-    DEG(9,167,4) = 0
-    DEG(9,167,5) = 0
-    DEG(9,167,6) = 0
-    DEG(9,167,7) = 0
-    DEG(9,167,8) = 0
-    DEG(9,167,9) = 1
-    DEG(9,167,10) = 1
-    DEG(9,167,11) = 0
-    DEG(9,167,12) = 0
-  COEF(9,167) = (-0.42384868785563795, 0)
-    DEG(9,168,1) = 1
-    DEG(9,168,2) = 0
-    DEG(9,168,3) = 0
-    DEG(9,168,4) = 1
-    DEG(9,168,5) = 0
-    DEG(9,168,6) = 0
-    DEG(9,168,7) = 0
-    DEG(9,168,8) = 0
-    DEG(9,168,9) = 1
-    DEG(9,168,10) = 1
-    DEG(9,168,11) = 0
-    DEG(9,168,12) = 0
-  COEF(9,168) = (0.42384868785563795, 0)
-    DEG(9,169,1) = 1
-    DEG(9,169,2) = 0
-    DEG(9,169,3) = 0
-    DEG(9,169,4) = 0
-    DEG(9,169,5) = 1
-    DEG(9,169,6) = 0
-    DEG(9,169,7) = 0
-    DEG(9,169,8) = 0
-    DEG(9,169,9) = 1
-    DEG(9,169,10) = 1
-    DEG(9,169,11) = 0
-    DEG(9,169,12) = 0
-  COEF(9,169) = (-1.8498537551403504, 0)
-    DEG(9,170,1) = 1
-    DEG(9,170,2) = 0
-    DEG(9,170,3) = 0
-    DEG(9,170,4) = 0
-    DEG(9,170,5) = 0
-    DEG(9,170,6) = 1
-    DEG(9,170,7) = 0
-    DEG(9,170,8) = 0
-    DEG(9,170,9) = 1
-    DEG(9,170,10) = 1
-    DEG(9,170,11) = 0
-    DEG(9,170,12) = 0
-  COEF(9,170) = (-2.7570442674519304, 0)
-    DEG(9,171,1) = 0
-    DEG(9,171,2) = 0
-    DEG(9,171,3) = 0
-    DEG(9,171,4) = 0
-    DEG(9,171,5) = 0
-    DEG(9,171,6) = 0
-    DEG(9,171,7) = 0
-    DEG(9,171,8) = 0
-    DEG(9,171,9) = 0
-    DEG(9,171,10) = 0
-    DEG(9,171,11) = 1
-    DEG(9,171,12) = 0
-  COEF(9,171) = (1.4008775248719703, 0)
-    DEG(9,172,1) = 0
-    DEG(9,172,2) = 1
-    DEG(9,172,3) = 0
-    DEG(9,172,4) = 1
-    DEG(9,172,5) = 0
-    DEG(9,172,6) = 0
-    DEG(9,172,7) = 0
-    DEG(9,172,8) = 0
-    DEG(9,172,9) = 0
-    DEG(9,172,10) = 0
-    DEG(9,172,11) = 1
-    DEG(9,172,12) = 0
-  COEF(9,172) = (2.2943850750363817, 0)
-    DEG(9,173,1) = 0
-    DEG(9,173,2) = 1
-    DEG(9,173,3) = 0
-    DEG(9,173,4) = 0
-    DEG(9,173,5) = 1
-    DEG(9,173,6) = 0
-    DEG(9,173,7) = 0
-    DEG(9,173,8) = 0
-    DEG(9,173,9) = 0
-    DEG(9,173,10) = 0
-    DEG(9,173,11) = 1
-    DEG(9,173,12) = 0
-  COEF(9,173) = (-1.4008775248719703, 0)
-    DEG(9,174,1) = 0
-    DEG(9,174,2) = 1
-    DEG(9,174,3) = 0
-    DEG(9,174,4) = 0
-    DEG(9,174,5) = 0
-    DEG(9,174,6) = 1
-    DEG(9,174,7) = 0
-    DEG(9,174,8) = 0
-    DEG(9,174,9) = 0
-    DEG(9,174,10) = 0
-    DEG(9,174,11) = 1
-    DEG(9,174,12) = 0
-  COEF(9,174) = (-0.7463601933544903, 0)
-    DEG(9,175,1) = 0
-    DEG(9,175,2) = 0
-    DEG(9,175,3) = 0
-    DEG(9,175,4) = 0
-    DEG(9,175,5) = 0
-    DEG(9,175,6) = 0
-    DEG(9,175,7) = 1
-    DEG(9,175,8) = 0
-    DEG(9,175,9) = 0
-    DEG(9,175,10) = 0
-    DEG(9,175,11) = 1
-    DEG(9,175,12) = 0
-  COEF(9,175) = (-2.2901536795293533, 0)
-    DEG(9,176,1) = 0
-    DEG(9,176,2) = 1
-    DEG(9,176,3) = 0
-    DEG(9,176,4) = 1
-    DEG(9,176,5) = 0
-    DEG(9,176,6) = 0
-    DEG(9,176,7) = 1
-    DEG(9,176,8) = 0
-    DEG(9,176,9) = 0
-    DEG(9,176,10) = 0
-    DEG(9,176,11) = 1
-    DEG(9,176,12) = 0
-  COEF(9,176) = (0.28127037862407506, 0)
-    DEG(9,177,1) = 0
-    DEG(9,177,2) = 1
-    DEG(9,177,3) = 0
-    DEG(9,177,4) = 0
-    DEG(9,177,5) = 1
-    DEG(9,177,6) = 0
-    DEG(9,177,7) = 1
-    DEG(9,177,8) = 0
-    DEG(9,177,9) = 0
-    DEG(9,177,10) = 0
-    DEG(9,177,11) = 1
-    DEG(9,177,12) = 0
-  COEF(9,177) = (2.2901536795293533, 0)
-    DEG(9,178,1) = 0
-    DEG(9,178,2) = 1
-    DEG(9,178,3) = 0
-    DEG(9,178,4) = 0
-    DEG(9,178,5) = 0
-    DEG(9,178,6) = 1
-    DEG(9,178,7) = 1
-    DEG(9,178,8) = 0
-    DEG(9,178,9) = 0
-    DEG(9,178,10) = 0
-    DEG(9,178,11) = 1
-    DEG(9,178,12) = 0
-  COEF(9,178) = (0.26216092668309676, 0)
-    DEG(9,179,1) = 0
-    DEG(9,179,2) = 0
-    DEG(9,179,3) = 0
-    DEG(9,179,4) = 0
-    DEG(9,179,5) = 0
-    DEG(9,179,6) = 0
-    DEG(9,179,7) = 0
-    DEG(9,179,8) = 1
-    DEG(9,179,9) = 0
-    DEG(9,179,10) = 0
-    DEG(9,179,11) = 1
-    DEG(9,179,12) = 0
-  COEF(9,179) = (2.2315161625197155, 0)
-    DEG(9,180,1) = 0
-    DEG(9,180,2) = 1
-    DEG(9,180,3) = 0
-    DEG(9,180,4) = 1
-    DEG(9,180,5) = 0
-    DEG(9,180,6) = 0
-    DEG(9,180,7) = 0
-    DEG(9,180,8) = 1
-    DEG(9,180,9) = 0
-    DEG(9,180,10) = 0
-    DEG(9,180,11) = 1
-    DEG(9,180,12) = 0
-  COEF(9,180) = (-0.9357034495118564, 0)
-    DEG(9,181,1) = 0
-    DEG(9,181,2) = 1
-    DEG(9,181,3) = 0
-    DEG(9,181,4) = 0
-    DEG(9,181,5) = 1
-    DEG(9,181,6) = 0
-    DEG(9,181,7) = 0
-    DEG(9,181,8) = 1
-    DEG(9,181,9) = 0
-    DEG(9,181,10) = 0
-    DEG(9,181,11) = 1
-    DEG(9,181,12) = 0
-  COEF(9,181) = (-2.2315161625197155, 0)
-    DEG(9,182,1) = 0
-    DEG(9,182,2) = 1
-    DEG(9,182,3) = 0
-    DEG(9,182,4) = 0
-    DEG(9,182,5) = 0
-    DEG(9,182,6) = 1
-    DEG(9,182,7) = 0
-    DEG(9,182,8) = 1
-    DEG(9,182,9) = 0
-    DEG(9,182,10) = 0
-    DEG(9,182,11) = 1
-    DEG(9,182,12) = 0
-  COEF(9,182) = (2.3312478082177184, 0)
-    DEG(9,183,1) = 0
-    DEG(9,183,2) = 0
-    DEG(9,183,3) = 0
-    DEG(9,183,4) = 0
-    DEG(9,183,5) = 0
-    DEG(9,183,6) = 0
-    DEG(9,183,7) = 0
-    DEG(9,183,8) = 0
-    DEG(9,183,9) = 1
-    DEG(9,183,10) = 0
-    DEG(9,183,11) = 1
-    DEG(9,183,12) = 0
-  COEF(9,183) = (1.8498537551403504, 0)
-    DEG(9,184,1) = 0
-    DEG(9,184,2) = 1
-    DEG(9,184,3) = 0
-    DEG(9,184,4) = 1
-    DEG(9,184,5) = 0
-    DEG(9,184,6) = 0
-    DEG(9,184,7) = 0
-    DEG(9,184,8) = 0
-    DEG(9,184,9) = 1
-    DEG(9,184,10) = 0
-    DEG(9,184,11) = 1
-    DEG(9,184,12) = 0
-  COEF(9,184) = (0.42384868785563795, 0)
-    DEG(9,185,1) = 0
-    DEG(9,185,2) = 1
-    DEG(9,185,3) = 0
-    DEG(9,185,4) = 0
-    DEG(9,185,5) = 1
-    DEG(9,185,6) = 0
-    DEG(9,185,7) = 0
-    DEG(9,185,8) = 0
-    DEG(9,185,9) = 1
-    DEG(9,185,10) = 0
-    DEG(9,185,11) = 1
-    DEG(9,185,12) = 0
-  COEF(9,185) = (-1.8498537551403504, 0)
-    DEG(9,186,1) = 0
-    DEG(9,186,2) = 1
-    DEG(9,186,3) = 0
-    DEG(9,186,4) = 0
-    DEG(9,186,5) = 0
-    DEG(9,186,6) = 1
-    DEG(9,186,7) = 0
-    DEG(9,186,8) = 0
-    DEG(9,186,9) = 1
-    DEG(9,186,10) = 0
-    DEG(9,186,11) = 1
-    DEG(9,186,12) = 0
-  COEF(9,186) = (-2.7570442674519304, 0)
-    DEG(9,187,1) = 0
-    DEG(9,187,2) = 0
-    DEG(9,187,3) = 0
-    DEG(9,187,4) = 0
-    DEG(9,187,5) = 0
-    DEG(9,187,6) = 0
-    DEG(9,187,7) = 0
-    DEG(9,187,8) = 0
-    DEG(9,187,9) = 0
-    DEG(9,187,10) = 0
-    DEG(9,187,11) = 0
-    DEG(9,187,12) = 1
-  COEF(9,187) = (0.7463601933544903, 0)
-    DEG(9,188,1) = 0
-    DEG(9,188,2) = 0
-    DEG(9,188,3) = 1
-    DEG(9,188,4) = 1
-    DEG(9,188,5) = 0
-    DEG(9,188,6) = 0
-    DEG(9,188,7) = 0
-    DEG(9,188,8) = 0
-    DEG(9,188,9) = 0
-    DEG(9,188,10) = 0
-    DEG(9,188,11) = 0
-    DEG(9,188,12) = 1
-  COEF(9,188) = (2.2943850750363817, 0)
-    DEG(9,189,1) = 0
-    DEG(9,189,2) = 0
-    DEG(9,189,3) = 1
-    DEG(9,189,4) = 0
-    DEG(9,189,5) = 1
-    DEG(9,189,6) = 0
-    DEG(9,189,7) = 0
-    DEG(9,189,8) = 0
-    DEG(9,189,9) = 0
-    DEG(9,189,10) = 0
-    DEG(9,189,11) = 0
-    DEG(9,189,12) = 1
-  COEF(9,189) = (-1.4008775248719703, 0)
-    DEG(9,190,1) = 0
-    DEG(9,190,2) = 0
-    DEG(9,190,3) = 1
-    DEG(9,190,4) = 0
-    DEG(9,190,5) = 0
-    DEG(9,190,6) = 1
-    DEG(9,190,7) = 0
-    DEG(9,190,8) = 0
-    DEG(9,190,9) = 0
-    DEG(9,190,10) = 0
-    DEG(9,190,11) = 0
-    DEG(9,190,12) = 1
-  COEF(9,190) = (-0.7463601933544903, 0)
-    DEG(9,191,1) = 0
-    DEG(9,191,2) = 0
-    DEG(9,191,3) = 0
-    DEG(9,191,4) = 0
-    DEG(9,191,5) = 0
-    DEG(9,191,6) = 0
-    DEG(9,191,7) = 1
-    DEG(9,191,8) = 0
-    DEG(9,191,9) = 0
-    DEG(9,191,10) = 0
-    DEG(9,191,11) = 0
-    DEG(9,191,12) = 1
-  COEF(9,191) = (-0.26216092668309676, 0)
-    DEG(9,192,1) = 0
-    DEG(9,192,2) = 0
-    DEG(9,192,3) = 1
-    DEG(9,192,4) = 1
-    DEG(9,192,5) = 0
-    DEG(9,192,6) = 0
-    DEG(9,192,7) = 1
-    DEG(9,192,8) = 0
-    DEG(9,192,9) = 0
-    DEG(9,192,10) = 0
-    DEG(9,192,11) = 0
-    DEG(9,192,12) = 1
-  COEF(9,192) = (0.28127037862407506, 0)
-    DEG(9,193,1) = 0
-    DEG(9,193,2) = 0
-    DEG(9,193,3) = 1
-    DEG(9,193,4) = 0
-    DEG(9,193,5) = 1
-    DEG(9,193,6) = 0
-    DEG(9,193,7) = 1
-    DEG(9,193,8) = 0
-    DEG(9,193,9) = 0
-    DEG(9,193,10) = 0
-    DEG(9,193,11) = 0
-    DEG(9,193,12) = 1
-  COEF(9,193) = (2.2901536795293533, 0)
-    DEG(9,194,1) = 0
-    DEG(9,194,2) = 0
-    DEG(9,194,3) = 1
-    DEG(9,194,4) = 0
-    DEG(9,194,5) = 0
-    DEG(9,194,6) = 1
-    DEG(9,194,7) = 1
-    DEG(9,194,8) = 0
-    DEG(9,194,9) = 0
-    DEG(9,194,10) = 0
-    DEG(9,194,11) = 0
-    DEG(9,194,12) = 1
-  COEF(9,194) = (0.26216092668309676, 0)
-    DEG(9,195,1) = 0
-    DEG(9,195,2) = 0
-    DEG(9,195,3) = 0
-    DEG(9,195,4) = 0
-    DEG(9,195,5) = 0
-    DEG(9,195,6) = 0
-    DEG(9,195,7) = 0
-    DEG(9,195,8) = 1
-    DEG(9,195,9) = 0
-    DEG(9,195,10) = 0
-    DEG(9,195,11) = 0
-    DEG(9,195,12) = 1
-  COEF(9,195) = (-2.3312478082177184, 0)
-    DEG(9,196,1) = 0
-    DEG(9,196,2) = 0
-    DEG(9,196,3) = 1
-    DEG(9,196,4) = 1
-    DEG(9,196,5) = 0
-    DEG(9,196,6) = 0
-    DEG(9,196,7) = 0
-    DEG(9,196,8) = 1
-    DEG(9,196,9) = 0
-    DEG(9,196,10) = 0
-    DEG(9,196,11) = 0
-    DEG(9,196,12) = 1
-  COEF(9,196) = (-0.9357034495118564, 0)
-    DEG(9,197,1) = 0
-    DEG(9,197,2) = 0
-    DEG(9,197,3) = 1
-    DEG(9,197,4) = 0
-    DEG(9,197,5) = 1
-    DEG(9,197,6) = 0
-    DEG(9,197,7) = 0
-    DEG(9,197,8) = 1
-    DEG(9,197,9) = 0
-    DEG(9,197,10) = 0
-    DEG(9,197,11) = 0
-    DEG(9,197,12) = 1
-  COEF(9,197) = (-2.2315161625197155, 0)
-    DEG(9,198,1) = 0
-    DEG(9,198,2) = 0
-    DEG(9,198,3) = 1
-    DEG(9,198,4) = 0
-    DEG(9,198,5) = 0
-    DEG(9,198,6) = 1
-    DEG(9,198,7) = 0
-    DEG(9,198,8) = 1
-    DEG(9,198,9) = 0
-    DEG(9,198,10) = 0
-    DEG(9,198,11) = 0
-    DEG(9,198,12) = 1
-  COEF(9,198) = (2.3312478082177184, 0)
-    DEG(9,199,1) = 0
-    DEG(9,199,2) = 0
-    DEG(9,199,3) = 0
-    DEG(9,199,4) = 0
-    DEG(9,199,5) = 0
-    DEG(9,199,6) = 0
-    DEG(9,199,7) = 0
-    DEG(9,199,8) = 0
-    DEG(9,199,9) = 1
-    DEG(9,199,10) = 0
-    DEG(9,199,11) = 0
-    DEG(9,199,12) = 1
-  COEF(9,199) = (2.7570442674519304, 0)
-    DEG(9,200,1) = 0
-    DEG(9,200,2) = 0
-    DEG(9,200,3) = 1
-    DEG(9,200,4) = 1
-    DEG(9,200,5) = 0
-    DEG(9,200,6) = 0
-    DEG(9,200,7) = 0
-    DEG(9,200,8) = 0
-    DEG(9,200,9) = 1
-    DEG(9,200,10) = 0
-    DEG(9,200,11) = 0
-    DEG(9,200,12) = 1
-  COEF(9,200) = (0.42384868785563795, 0)
-    DEG(9,201,1) = 0
-    DEG(9,201,2) = 0
-    DEG(9,201,3) = 1
-    DEG(9,201,4) = 0
-    DEG(9,201,5) = 1
-    DEG(9,201,6) = 0
-    DEG(9,201,7) = 0
-    DEG(9,201,8) = 0
-    DEG(9,201,9) = 1
-    DEG(9,201,10) = 0
-    DEG(9,201,11) = 0
-    DEG(9,201,12) = 1
-  COEF(9,201) = (-1.8498537551403504, 0)
-    DEG(9,202,1) = 0
-    DEG(9,202,2) = 0
-    DEG(9,202,3) = 1
-    DEG(9,202,4) = 0
-    DEG(9,202,5) = 0
-    DEG(9,202,6) = 1
-    DEG(9,202,7) = 0
-    DEG(9,202,8) = 0
-    DEG(9,202,9) = 1
-    DEG(9,202,10) = 0
-    DEG(9,202,11) = 0
-    DEG(9,202,12) = 1
-  COEF(9,202) = (-2.7570442674519304, 0)
-
-NUM_TERMS(10) = 4
-    DEG(10,1,1) = 0
-    DEG(10,1,2) = 0
-    DEG(10,1,3) = 0
-    DEG(10,1,4) = 0
-    DEG(10,1,5) = 0
-    DEG(10,1,6) = 0
-    DEG(10,1,7) = 0
-    DEG(10,1,8) = 0
-    DEG(10,1,9) = 0
-    DEG(10,1,10) = 0
-    DEG(10,1,11) = 0
-    DEG(10,1,12) = 0
-  COEF(10,1) = (-1., 0)
-    DEG(10,2,1) = 2
-    DEG(10,2,2) = 0
-    DEG(10,2,3) = 0
-    DEG(10,2,4) = 0
-    DEG(10,2,5) = 0
-    DEG(10,2,6) = 0
-    DEG(10,2,7) = 0
-    DEG(10,2,8) = 0
-    DEG(10,2,9) = 0
-    DEG(10,2,10) = 0
-    DEG(10,2,11) = 0
-    DEG(10,2,12) = 0
-  COEF(10,2) = (1, 0)
-    DEG(10,3,1) = 0
-    DEG(10,3,2) = 2
-    DEG(10,3,3) = 0
-    DEG(10,3,4) = 0
-    DEG(10,3,5) = 0
-    DEG(10,3,6) = 0
-    DEG(10,3,7) = 0
-    DEG(10,3,8) = 0
-    DEG(10,3,9) = 0
-    DEG(10,3,10) = 0
-    DEG(10,3,11) = 0
-    DEG(10,3,12) = 0
-  COEF(10,3) = (1, 0)
-    DEG(10,4,1) = 0
-    DEG(10,4,2) = 0
-    DEG(10,4,3) = 2
-    DEG(10,4,4) = 0
-    DEG(10,4,5) = 0
-    DEG(10,4,6) = 0
-    DEG(10,4,7) = 0
-    DEG(10,4,8) = 0
-    DEG(10,4,9) = 0
-    DEG(10,4,10) = 0
-    DEG(10,4,11) = 0
-    DEG(10,4,12) = 0
-  COEF(10,4) = (1, 0)
-
-NUM_TERMS(11) = 4
-    DEG(11,1,1) = 0
-    DEG(11,1,2) = 0
-    DEG(11,1,3) = 0
-    DEG(11,1,4) = 0
-    DEG(11,1,5) = 0
-    DEG(11,1,6) = 0
-    DEG(11,1,7) = 0
-    DEG(11,1,8) = 0
-    DEG(11,1,9) = 0
-    DEG(11,1,10) = 0
-    DEG(11,1,11) = 0
-    DEG(11,1,12) = 0
-  COEF(11,1) = (-1., 0)
-    DEG(11,2,1) = 1
-    DEG(11,2,2) = 0
-    DEG(11,2,3) = 0
-    DEG(11,2,4) = 1
-    DEG(11,2,5) = 0
-    DEG(11,2,6) = 0
-    DEG(11,2,7) = 0
-    DEG(11,2,8) = 0
-    DEG(11,2,9) = 0
-    DEG(11,2,10) = 0
-    DEG(11,2,11) = 0
-    DEG(11,2,12) = 0
-  COEF(11,2) = (1, 0)
-    DEG(11,3,1) = 0
-    DEG(11,3,2) = 1
-    DEG(11,3,3) = 0
-    DEG(11,3,4) = 0
-    DEG(11,3,5) = 1
-    DEG(11,3,6) = 0
-    DEG(11,3,7) = 0
-    DEG(11,3,8) = 0
-    DEG(11,3,9) = 0
-    DEG(11,3,10) = 0
-    DEG(11,3,11) = 0
-    DEG(11,3,12) = 0
-  COEF(11,3) = (1, 0)
-    DEG(11,4,1) = 0
-    DEG(11,4,2) = 0
-    DEG(11,4,3) = 1
-    DEG(11,4,4) = 0
-    DEG(11,4,5) = 0
-    DEG(11,4,6) = 1
-    DEG(11,4,7) = 0
-    DEG(11,4,8) = 0
-    DEG(11,4,9) = 0
-    DEG(11,4,10) = 0
-    DEG(11,4,11) = 0
-    DEG(11,4,12) = 0
-  COEF(11,4) = (1, 0)
-
-NUM_TERMS(12) = 3
-    DEG(12,1,1) = 0
-    DEG(12,1,2) = 0
-    DEG(12,1,3) = 0
-    DEG(12,1,4) = 1
-    DEG(12,1,5) = 0
-    DEG(12,1,6) = 0
-    DEG(12,1,7) = 0
-    DEG(12,1,8) = 0
-    DEG(12,1,9) = 0
-    DEG(12,1,10) = 1
-    DEG(12,1,11) = 0
-    DEG(12,1,12) = 0
-  COEF(12,1) = (1, 0)
-    DEG(12,2,1) = 0
-    DEG(12,2,2) = 0
-    DEG(12,2,3) = 0
-    DEG(12,2,4) = 0
-    DEG(12,2,5) = 1
-    DEG(12,2,6) = 0
-    DEG(12,2,7) = 0
-    DEG(12,2,8) = 0
-    DEG(12,2,9) = 0
-    DEG(12,2,10) = 0
-    DEG(12,2,11) = 1
-    DEG(12,2,12) = 0
-  COEF(12,2) = (1, 0)
-    DEG(12,3,1) = 0
-    DEG(12,3,2) = 0
-    DEG(12,3,3) = 0
-    DEG(12,3,4) = 0
-    DEG(12,3,5) = 0
-    DEG(12,3,6) = 1
-    DEG(12,3,7) = 0
-    DEG(12,3,8) = 0
-    DEG(12,3,9) = 0
-    DEG(12,3,10) = 0
-    DEG(12,3,11) = 0
-    DEG(12,3,12) = 1
-  COEF(12,3) = (1, 0)
-
-/
-
-&SYSGLPSET ROOT_COUNT_ONLY = .FALSE.
-P(1) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(2) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(3) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(4) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(5) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(6) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(7) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(8) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(9) = '{{p1, p2, p3}, {p1, p2, p3, q1, q2, q3}, {k1, k2, k3}, {k1, k2, k3, a, b, c}}'
-P(10) = '{{a, b, c}, {k1, k2, k3, p1, p2, p3, q1, q2, q3}'
-P(11) = '{{k1, k2, k3}, {a, b, c}, {p1, p2, p3, q1, q2, q3}}'
-P(12) = '{{k1, k2, k3}, {q1, q2, q3}, {a, b, c, p1, p2, p3}}'
-DG(1) = '{1, 1, 1, 1}'
-DG(2) = '{1, 1, 1, 1}'
-DG(3) = '{1, 1, 1, 1}'
-DG(4) = '{1, 1, 1, 1}'
-DG(5) = '{1, 1, 1, 1}'
-DG(6) = '{1, 1, 1, 1}'
-DG(7) = '{1, 1, 1, 1}'
-DG(8) = '{1, 1, 1, 1}'
-DG(9) = '{1, 1, 1, 1}'
-DG(10) = '{2, 0}'
-DG(11) = '{1, 1, 0}'
-DG(12) = '{1, 1, 0}'
-
-NUM_SETS(1) = 4
-  NUM_INDICES(1,1) = 3  SET_DEG(1,1) = 1
-    INDEX(1,1,1) = 7
-    INDEX(1,1,2) = 8
-    INDEX(1,1,3) = 9
-  NUM_INDICES(1,2) = 6  SET_DEG(1,2) = 1
-    INDEX(1,2,1) = 7
-    INDEX(1,2,2) = 8
-    INDEX(1,2,3) = 9
-    INDEX(1,2,4) = 10
-    INDEX(1,2,5) = 11
-    INDEX(1,2,6) = 12
-  NUM_INDICES(1,3) = 3  SET_DEG(1,3) = 1
-    INDEX(1,3,1) = 4
-    INDEX(1,3,2) = 5
-    INDEX(1,3,3) = 6
-  NUM_INDICES(1,4) = 6  SET_DEG(1,4) = 1
-    INDEX(1,4,1) = 4
-    INDEX(1,4,2) = 5
-    INDEX(1,4,3) = 6
-    INDEX(1,4,4) = 1
-    INDEX(1,4,5) = 2
-    INDEX(1,4,6) = 3
-NUM_SETS(2) = 4
-  NUM_INDICES(2,1) = 3  SET_DEG(2,1) = 1
-    INDEX(2,1,1) = 7
-    INDEX(2,1,2) = 8
-    INDEX(2,1,3) = 9
-  NUM_INDICES(2,2) = 6  SET_DEG(2,2) = 1
-    INDEX(2,2,1) = 7
-    INDEX(2,2,2) = 8
-    INDEX(2,2,3) = 9
-    INDEX(2,2,4) = 10
-    INDEX(2,2,5) = 11
-    INDEX(2,2,6) = 12
-  NUM_INDICES(2,3) = 3  SET_DEG(2,3) = 1
-    INDEX(2,3,1) = 4
-    INDEX(2,3,2) = 5
-    INDEX(2,3,3) = 6
-  NUM_INDICES(2,4) = 6  SET_DEG(2,4) = 1
-    INDEX(2,4,1) = 4
-    INDEX(2,4,2) = 5
-    INDEX(2,4,3) = 6
-    INDEX(2,4,4) = 1
-    INDEX(2,4,5) = 2
-    INDEX(2,4,6) = 3
-NUM_SETS(3) = 4
-  NUM_INDICES(3,1) = 3  SET_DEG(3,1) = 1
-    INDEX(3,1,1) = 7
-    INDEX(3,1,2) = 8
-    INDEX(3,1,3) = 9
-  NUM_INDICES(3,2) = 6  SET_DEG(3,2) = 1
-    INDEX(3,2,1) = 7
-    INDEX(3,2,2) = 8
-    INDEX(3,2,3) = 9
-    INDEX(3,2,4) = 10
-    INDEX(3,2,5) = 11
-    INDEX(3,2,6) = 12
-  NUM_INDICES(3,3) = 3  SET_DEG(3,3) = 1
-    INDEX(3,3,1) = 4
-    INDEX(3,3,2) = 5
-    INDEX(3,3,3) = 6
-  NUM_INDICES(3,4) = 6  SET_DEG(3,4) = 1
-    INDEX(3,4,1) = 4
-    INDEX(3,4,2) = 5
-    INDEX(3,4,3) = 6
-    INDEX(3,4,4) = 1
-    INDEX(3,4,5) = 2
-    INDEX(3,4,6) = 3
-NUM_SETS(4) = 4
-  NUM_INDICES(4,1) = 3  SET_DEG(4,1) = 1
-    INDEX(4,1,1) = 7
-    INDEX(4,1,2) = 8
-    INDEX(4,1,3) = 9
-  NUM_INDICES(4,2) = 6  SET_DEG(4,2) = 1
-    INDEX(4,2,1) = 7
-    INDEX(4,2,2) = 8
-    INDEX(4,2,3) = 9
-    INDEX(4,2,4) = 10
-    INDEX(4,2,5) = 11
-    INDEX(4,2,6) = 12
-  NUM_INDICES(4,3) = 3  SET_DEG(4,3) = 1
-    INDEX(4,3,1) = 4
-    INDEX(4,3,2) = 5
-    INDEX(4,3,3) = 6
-  NUM_INDICES(4,4) = 6  SET_DEG(4,4) = 1
-    INDEX(4,4,1) = 4
-    INDEX(4,4,2) = 5
-    INDEX(4,4,3) = 6
-    INDEX(4,4,4) = 1
-    INDEX(4,4,5) = 2
-    INDEX(4,4,6) = 3
-NUM_SETS(5) = 4
-  NUM_INDICES(5,1) = 3  SET_DEG(5,1) = 1
-    INDEX(5,1,1) = 7
-    INDEX(5,1,2) = 8
-    INDEX(5,1,3) = 9
-  NUM_INDICES(5,2) = 6  SET_DEG(5,2) = 1
-    INDEX(5,2,1) = 7
-    INDEX(5,2,2) = 8
-    INDEX(5,2,3) = 9
-    INDEX(5,2,4) = 10
-    INDEX(5,2,5) = 11
-    INDEX(5,2,6) = 12
-  NUM_INDICES(5,3) = 3  SET_DEG(5,3) = 1
-    INDEX(5,3,1) = 4
-    INDEX(5,3,2) = 5
-    INDEX(5,3,3) = 6
-  NUM_INDICES(5,4) = 6  SET_DEG(5,4) = 1
-    INDEX(5,4,1) = 4
-    INDEX(5,4,2) = 5
-    INDEX(5,4,3) = 6
-    INDEX(5,4,4) = 1
-    INDEX(5,4,5) = 2
-    INDEX(5,4,6) = 3
-NUM_SETS(6) = 4
-  NUM_INDICES(6,1) = 3  SET_DEG(6,1) = 1
-    INDEX(6,1,1) = 7
-    INDEX(6,1,2) = 8
-    INDEX(6,1,3) = 9
-  NUM_INDICES(6,2) = 6  SET_DEG(6,2) = 1
-    INDEX(6,2,1) = 7
-    INDEX(6,2,2) = 8
-    INDEX(6,2,3) = 9
-    INDEX(6,2,4) = 10
-    INDEX(6,2,5) = 11
-    INDEX(6,2,6) = 12
-  NUM_INDICES(6,3) = 3  SET_DEG(6,3) = 1
-    INDEX(6,3,1) = 4
-    INDEX(6,3,2) = 5
-    INDEX(6,3,3) = 6
-  NUM_INDICES(6,4) = 6  SET_DEG(6,4) = 1
-    INDEX(6,4,1) = 4
-    INDEX(6,4,2) = 5
-    INDEX(6,4,3) = 6
-    INDEX(6,4,4) = 1
-    INDEX(6,4,5) = 2
-    INDEX(6,4,6) = 3
-NUM_SETS(7) = 4
-  NUM_INDICES(7,1) = 3  SET_DEG(7,1) = 1
-    INDEX(7,1,1) = 7
-    INDEX(7,1,2) = 8
-    INDEX(7,1,3) = 9
-  NUM_INDICES(7,2) = 6  SET_DEG(7,2) = 1
-    INDEX(7,2,1) = 7
-    INDEX(7,2,2) = 8
-    INDEX(7,2,3) = 9
-    INDEX(7,2,4) = 10
-    INDEX(7,2,5) = 11
-    INDEX(7,2,6) = 12
-  NUM_INDICES(7,3) = 3  SET_DEG(7,3) = 1
-    INDEX(7,3,1) = 4
-    INDEX(7,3,2) = 5
-    INDEX(7,3,3) = 6
-  NUM_INDICES(7,4) = 6  SET_DEG(7,4) = 1
-    INDEX(7,4,1) = 4
-    INDEX(7,4,2) = 5
-    INDEX(7,4,3) = 6
-    INDEX(7,4,4) = 1
-    INDEX(7,4,5) = 2
-    INDEX(7,4,6) = 3
-NUM_SETS(8) = 4
-  NUM_INDICES(8,1) = 3  SET_DEG(8,1) = 1
-    INDEX(8,1,1) = 7
-    INDEX(8,1,2) = 8
-    INDEX(8,1,3) = 9
-  NUM_INDICES(8,2) = 6  SET_DEG(8,2) = 1
-    INDEX(8,2,1) = 7
-    INDEX(8,2,2) = 8
-    INDEX(8,2,3) = 9
-    INDEX(8,2,4) = 10
-    INDEX(8,2,5) = 11
-    INDEX(8,2,6) = 12
-  NUM_INDICES(8,3) = 3  SET_DEG(8,3) = 1
-    INDEX(8,3,1) = 4
-    INDEX(8,3,2) = 5
-    INDEX(8,3,3) = 6
-  NUM_INDICES(8,4) = 6  SET_DEG(8,4) = 1
-    INDEX(8,4,1) = 4
-    INDEX(8,4,2) = 5
-    INDEX(8,4,3) = 6
-    INDEX(8,4,4) = 1
-    INDEX(8,4,5) = 2
-    INDEX(8,4,6) = 3
-NUM_SETS(9) = 4
-  NUM_INDICES(9,1) = 3  SET_DEG(9,1) = 1
-    INDEX(9,1,1) = 7
-    INDEX(9,1,2) = 8
-    INDEX(9,1,3) = 9
-  NUM_INDICES(9,2) = 6  SET_DEG(9,2) = 1
-    INDEX(9,2,1) = 7
-    INDEX(9,2,2) = 8
-    INDEX(9,2,3) = 9
-    INDEX(9,2,4) = 10
-    INDEX(9,2,5) = 11
-    INDEX(9,2,6) = 12
-  NUM_INDICES(9,3) = 3  SET_DEG(9,3) = 1
-    INDEX(9,3,1) = 4
-    INDEX(9,3,2) = 5
-    INDEX(9,3,3) = 6
-  NUM_INDICES(9,4) = 6  SET_DEG(9,4) = 1
-    INDEX(9,4,1) = 4
-    INDEX(9,4,2) = 5
-    INDEX(9,4,3) = 6
-    INDEX(9,4,4) = 1
-    INDEX(9,4,5) = 2
-    INDEX(9,4,6) = 3
-NUM_SETS(10) = 2
-  NUM_INDICES(10,1) = 3  SET_DEG(10,1) = 2
-    INDEX(10,1,1) = 1
-    INDEX(10,1,2) = 2
-    INDEX(10,1,3) = 3
-  NUM_INDICES(10,2) = 9  SET_DEG(10,2) = 0
-    INDEX(10,2,1) = 4
-    INDEX(10,2,2) = 5
-    INDEX(10,2,3) = 6
-    INDEX(10,2,4) = 7 
-    INDEX(10,2,5) = 8
-    INDEX(10,2,6) = 9
-    INDEX(10,2,7) = 10
-    INDEX(10,2,8) = 11
-    INDEX(10,2,9) = 12    
-NUM_SETS(11) = 3
-  NUM_INDICES(11,1) = 3  SET_DEG(11,1) = 1
-    INDEX(11,1,1) = 4
-    INDEX(11,1,2) = 5
-    INDEX(11,1,3) = 6
-  NUM_INDICES(11,2) = 3  SET_DEG(11,2) = 1
-    INDEX(11,2,1) = 1
-    INDEX(11,2,2) = 2
-    INDEX(11,2,3) = 3
-  NUM_INDICES(11,3) = 6  SET_DEG(11,3) = 0
-    INDEX(11,3,1) = 7
-    INDEX(11,3,2) = 8
-    INDEX(11,3,3) = 9
-    INDEX(11,3,4) = 10
-    INDEX(11,3,5) = 11
-    INDEX(11,3,6) = 12    
-NUM_SETS(12) = 3
-  NUM_INDICES(12,1) = 3  SET_DEG(12,1) = 1
-    INDEX(12,1,1) = 4
-    INDEX(12,1,2) = 5
-    INDEX(12,1,3) = 6
-  NUM_INDICES(12,2) = 3  SET_DEG(12,2) = 1
-    INDEX(12,2,1) = 10
-    INDEX(12,2,2) = 11
-    INDEX(12,2,3) = 12
-  NUM_INDICES(12,3) = 6  SET_DEG(12,3) = 0
-    INDEX(12,3,1) = 1
-    INDEX(12,3,2) = 2
-    INDEX(12,3,3) = 3
-    INDEX(12,3,4) = 7
-    INDEX(12,3,5) = 8
-    INDEX(12,3,6) = 9
-/
diff --git a/sandbox/857/README b/sandbox/857/README
deleted file mode 100644
index a518c6b..0000000
--- a/sandbox/857/README
+++ /dev/null
@@ -1,87 +0,0 @@
-				POLSYS_GLP
-
-POLSYS_GLP is Fortran 95 parallel code for solving N complex coefficient
-polynomial systems of equations in N unknowns by a probability-one,
-globally convergent homotopy method.  The package is fully portable across
-various distributed and parallel computing platforms since it uses the
-Message Passing Interface (MPI) communication library.  POLSYS_GLP
-consists of two modules:  GLOBAL_GLP and POLSYS2.  The module GLOBAL_GLP
-contains the derived data types that define the polynomial system, the
-system covering, and the start system of the homotopy; the module POLSYS2
-contains the actual solver POLSYS_GLP and its internal routines, CHECK_GLP
-that verifies the input set covering structure, and the routines
-responsible for root counting, BEZOUT_GLP and SINGSYS_GLP.  POLSYS_GLP
-uses the HOMPACK90 modules HOMOTOPY, HOMPACK90_GLOBAL, and REAL_PRECISION,
-the HOMPACK90 path tracking routine STEPNX, and numerous BLAS and LAPACK
-routines.
-
-The physical organization into files is:  the file polsys_glp.f90 contains
-(in order) REAL_PRECISION, GLOBAL_GLP, POLSYS2, HOMPACK90_GLOBAL, HOMOTOPY,
-and STEPNX; the file lapack_glp.f contains all the necessary BLAS and
-LAPACK routines.  A sample calling program MAIN_TEMPLATE and a template for
-a hand-crafted function/Jacobian matrix evaluation program
-TARGET_SYSTEM_USER are contained in the file main_template.f90.  All
-processors execute MAIN_TEMPLATE and read the data file INPUT.DAT.
-MAIN_TEMPLATE writes the solutions to the file OUTPUT.DAT only by the
-master processor. The included files INPUT.DAT and OUTPUT.DAT contain
-sample input and output data for several test polynomial systems.  Similar
-to POLSYS_PLP (Algorithm 801), POLSYS_GLP can batch process multiple
-systems and tasks from one input file.  The file test_install.f90 contains
-a main program TEST_INSTALL to verify the installation.  It reads
-INPUT.DAT, solves a problem defined there, compares the computed results to
-known answers, and prints a message indicating whether the installation was
-apparently successful.
-
-To test the package, the file makefile.in must be edited to invoke the
-user's Fortran 95 compiler. Two files,  makefile.inPGI  and
-makefile.inXLF , are provided for the PGI and XLF compilers, respectively.
-These files may be copied directly into the file  makefile.in .  Next, type
-   make polsys_glp
-to build the driver MAIN_TEMPLATE or type
-   make test_install
-to build TEST_INSTALL.  Executing TEST_INSTALL provides a simple test of the
-installation.  Note that an implementation of MPI has to be installed to
-compile POLSYS_GLP.  Since both polsys_glp.f90 and main_template.f90 contain
-MPI primitives, it is advisable to compile these two files with compilers
-provided by the given MPI implementation. For example, if MPICH
-(http://www-unix.mcs.anl.gov/mpi/mpich) is installed, use mpif90 for
-compilation and linking, since it already has all the necessary include and
-link paths resolved.  To run the created executable file <program_name> on
-four processors of a Beowulf cluster, issue the following command:
-   mpirun -np 4 program_name
-
-There must be at least two processors to obtain solutions.  One processor
-is the master processor that distributes the homotopy paths and collects
-the zeros, and the remaining processors track the paths.  For the sample
-input file INPUT.DAT, the results should match those in the sample output
-file OUTPUT.DAT, although the zeros may be listed in a different order due
-to compiler/machine differences.
-
-For a Beowulf cluster, a sample PBS script file is:
-
-#!/bin/csh
-#PBS -N polsys_glp
-#PBS -l nodes=4:ppn=2
-#PBS -l walltime=10:00:00
-#
-# Edit the next line to reflect your working directory.
-cd ~
-#
-mpirun -np 4 program_name >& glp.out
-# End of example script.
-
-The modules and external subroutines in polsys_glp.f90 and lapack_glp.f can
-be stored in module and object libraries and need not be recompiled.  The
-subroutine TARGET_SYSTEM_USER defines the polynomial system and its
-Jacobian matrix, or a dummy subroutine, and must be supplied on every call
-to POLSYS_GLP.  However, if the user does not wish to change
-TARGET_SYSTEM_USER, its object code can be stored in the aforementioned
-object library.
-
--------------------------------------------------------------------------------
-
-Inquiries should be directed to Hai-Jun Su (suh@uci.eng.edu), J. Michael 
-McCarthy (jmmccart@uci.edu), Department of Mechanical and Aerospace 
-Engineering, UCI, Irvine, CA 92697, (949) 824-8051;  or Layne T. Watson 
-(ltw@cs.vt.edu), Departments of Computer Science and Mathematics,
-VPI & SU, Blacksburg, VA 24061, (540) 231-7540.
diff --git a/sandbox/857/RPS10.DAT b/sandbox/857/RPS10.DAT
deleted file mode 100644
index 6ea9100..0000000
--- a/sandbox/857/RPS10.DAT
+++ /dev/null
@@ -1,7789 +0,0 @@
-&PROBLEM  NEW_PROBLEM = .TRUE. 
-TITLE = ' Spatial RPS Mechanism 10 Position Synthesis with 1024 Roots'
-
-TRACKTOL = 1.D-04
-FINALTOL = 1.D-12
-SINGTOL = 0.0
-SSPAR(5) = 1.D+00
-NUMRR = 1
-N = 10
-
-NUM_TERMS(1) = 76
-    DEG(1,1,1) = 2
-    DEG(1,1,2) = 0
-    DEG(1,1,3) = 0
-    DEG(1,1,4) = 0
-    DEG(1,1,5) = 0
-    DEG(1,1,6) = 0
-    DEG(1,1,7) = 0
-    DEG(1,1,8) = 0
-    DEG(1,1,9) = 0
-    DEG(1,1,10) = 0
-  COEF(1,1) = (-0.1279703687075118, 0)
-    DEG(1,2,1) = 1
-    DEG(1,2,2) = 1
-    DEG(1,2,3) = 0
-    DEG(1,2,4) = 0
-    DEG(1,2,5) = 0
-    DEG(1,2,6) = 0
-    DEG(1,2,7) = 0
-    DEG(1,2,8) = 0
-    DEG(1,2,9) = 0
-    DEG(1,2,10) = 0
-  COEF(1,2) = (-0.48596123125526264, 0)
-    DEG(1,3,1) = 0
-    DEG(1,3,2) = 2
-    DEG(1,3,3) = 0
-    DEG(1,3,4) = 0
-    DEG(1,3,5) = 0
-    DEG(1,3,6) = 0
-    DEG(1,3,7) = 0
-    DEG(1,3,8) = 0
-    DEG(1,3,9) = 0
-    DEG(1,3,10) = 0
-  COEF(1,3) = (0.30699556370717496, 0)
-    DEG(1,4,1) = 1
-    DEG(1,4,2) = 0
-    DEG(1,4,3) = 1
-    DEG(1,4,4) = 0
-    DEG(1,4,5) = 0
-    DEG(1,4,6) = 0
-    DEG(1,4,7) = 0
-    DEG(1,4,8) = 0
-    DEG(1,4,9) = 0
-    DEG(1,4,10) = 0
-  COEF(1,4) = (0.3778977698527674, 0)
-    DEG(1,5,1) = 0
-    DEG(1,5,2) = 1
-    DEG(1,5,3) = 1
-    DEG(1,5,4) = 0
-    DEG(1,5,5) = 0
-    DEG(1,5,6) = 0
-    DEG(1,5,7) = 0
-    DEG(1,5,8) = 0
-    DEG(1,5,9) = 0
-    DEG(1,5,10) = 0
-  COEF(1,5) = (-0.23404544076569642, 0)
-    DEG(1,6,1) = 0
-    DEG(1,6,2) = 0
-    DEG(1,6,3) = 2
-    DEG(1,6,4) = 0
-    DEG(1,6,5) = 0
-    DEG(1,6,6) = 0
-    DEG(1,6,7) = 0
-    DEG(1,6,8) = 0
-    DEG(1,6,9) = 0
-    DEG(1,6,10) = 0
-  COEF(1,6) = (0.01563626178508072, 0)
-    DEG(1,7,1) = 2
-    DEG(1,7,2) = 0
-    DEG(1,7,3) = 0
-    DEG(1,7,4) = 1
-    DEG(1,7,5) = 0
-    DEG(1,7,6) = 0
-    DEG(1,7,7) = 0
-    DEG(1,7,8) = 0
-    DEG(1,7,9) = 0
-    DEG(1,7,10) = 0
-  COEF(1,7) = (0.327228678790004, 0)
-    DEG(1,8,1) = 1
-    DEG(1,8,2) = 1
-    DEG(1,8,3) = 0
-    DEG(1,8,4) = 1
-    DEG(1,8,5) = 0
-    DEG(1,8,6) = 0
-    DEG(1,8,7) = 0
-    DEG(1,8,8) = 0
-    DEG(1,8,9) = 0
-    DEG(1,8,10) = 0
-  COEF(1,8) = (0.8426829275672494, 0)
-    DEG(1,9,1) = 0
-    DEG(1,9,2) = 2
-    DEG(1,9,3) = 0
-    DEG(1,9,4) = 1
-    DEG(1,9,5) = 0
-    DEG(1,9,6) = 0
-    DEG(1,9,7) = 0
-    DEG(1,9,8) = 0
-    DEG(1,9,9) = 0
-    DEG(1,9,10) = 0
-  COEF(1,9) = (0.6075645757034159, 0)
-    DEG(1,10,1) = 1
-    DEG(1,10,2) = 0
-    DEG(1,10,3) = 1
-    DEG(1,10,4) = 1
-    DEG(1,10,5) = 0
-    DEG(1,10,6) = 0
-    DEG(1,10,7) = 0
-    DEG(1,10,8) = 0
-    DEG(1,10,9) = 0
-    DEG(1,10,10) = 0
-  COEF(1,10) = (-1.1371405598667543, 0)
-    DEG(1,11,1) = 0
-    DEG(1,11,2) = 1
-    DEG(1,11,3) = 1
-    DEG(1,11,4) = 1
-    DEG(1,11,5) = 0
-    DEG(1,11,6) = 0
-    DEG(1,11,7) = 0
-    DEG(1,11,8) = 0
-    DEG(1,11,9) = 0
-    DEG(1,11,10) = 0
-  COEF(1,11) = (0.229293271620915, 0)
-    DEG(1,12,1) = 0
-    DEG(1,12,2) = 0
-    DEG(1,12,3) = 2
-    DEG(1,12,4) = 1
-    DEG(1,12,5) = 0
-    DEG(1,12,6) = 0
-    DEG(1,12,7) = 0
-    DEG(1,12,8) = 0
-    DEG(1,12,9) = 0
-    DEG(1,12,10) = 0
-  COEF(1,12) = (-0.21948911177437957, 0)
-    DEG(1,13,1) = 2
-    DEG(1,13,2) = 0
-    DEG(1,13,3) = 0
-    DEG(1,13,4) = 2
-    DEG(1,13,5) = 0
-    DEG(1,13,6) = 0
-    DEG(1,13,7) = 0
-    DEG(1,13,8) = 0
-    DEG(1,13,9) = 0
-    DEG(1,13,10) = 0
-  COEF(1,13) = (-0.2075154964282774, 0)
-    DEG(1,14,1) = 1
-    DEG(1,14,2) = 1
-    DEG(1,14,3) = 0
-    DEG(1,14,4) = 2
-    DEG(1,14,5) = 0
-    DEG(1,14,6) = 0
-    DEG(1,14,7) = 0
-    DEG(1,14,8) = 0
-    DEG(1,14,9) = 0
-    DEG(1,14,10) = 0
-  COEF(1,14) = (-0.37702968479068544, 0)
-    DEG(1,15,1) = 0
-    DEG(1,15,2) = 2
-    DEG(1,15,3) = 0
-    DEG(1,15,4) = 2
-    DEG(1,15,5) = 0
-    DEG(1,15,6) = 0
-    DEG(1,15,7) = 0
-    DEG(1,15,8) = 0
-    DEG(1,15,9) = 0
-    DEG(1,15,10) = 0
-  COEF(1,15) = (-0.16688906819159421, 0)
-    DEG(1,16,1) = 1
-    DEG(1,16,2) = 0
-    DEG(1,16,3) = 1
-    DEG(1,16,4) = 2
-    DEG(1,16,5) = 0
-    DEG(1,16,6) = 0
-    DEG(1,16,7) = 0
-    DEG(1,16,8) = 0
-    DEG(1,16,9) = 0
-    DEG(1,16,10) = 0
-  COEF(1,16) = (0.7986954318323025, 0)
-    DEG(1,17,1) = 0
-    DEG(1,17,2) = 1
-    DEG(1,17,3) = 1
-    DEG(1,17,4) = 2
-    DEG(1,17,5) = 0
-    DEG(1,17,6) = 0
-    DEG(1,17,7) = 0
-    DEG(1,17,8) = 0
-    DEG(1,17,9) = 0
-    DEG(1,17,10) = 0
-  COEF(1,17) = (0.866826144775651, 0)
-    DEG(1,18,1) = 0
-    DEG(1,18,2) = 0
-    DEG(1,18,3) = 2
-    DEG(1,18,4) = 2
-    DEG(1,18,5) = 0
-    DEG(1,18,6) = 0
-    DEG(1,18,7) = 0
-    DEG(1,18,8) = 0
-    DEG(1,18,9) = 0
-    DEG(1,18,10) = 0
-  COEF(1,18) = (0.37440456461987165, 0)
-    DEG(1,19,1) = 2
-    DEG(1,19,2) = 0
-    DEG(1,19,3) = 0
-    DEG(1,19,4) = 0
-    DEG(1,19,5) = 1
-    DEG(1,19,6) = 0
-    DEG(1,19,7) = 0
-    DEG(1,19,8) = 0
-    DEG(1,19,9) = 0
-    DEG(1,19,10) = 0
-  COEF(1,19) = (1.5614616440131446, 0)
-    DEG(1,20,1) = 1
-    DEG(1,20,2) = 1
-    DEG(1,20,3) = 0
-    DEG(1,20,4) = 0
-    DEG(1,20,5) = 1
-    DEG(1,20,6) = 0
-    DEG(1,20,7) = 0
-    DEG(1,20,8) = 0
-    DEG(1,20,9) = 0
-    DEG(1,20,10) = 0
-  COEF(1,20) = (-1.7388380675822595, 0)
-    DEG(1,21,1) = 0
-    DEG(1,21,2) = 2
-    DEG(1,21,3) = 0
-    DEG(1,21,4) = 0
-    DEG(1,21,5) = 1
-    DEG(1,21,6) = 0
-    DEG(1,21,7) = 0
-    DEG(1,21,8) = 0
-    DEG(1,21,9) = 0
-    DEG(1,21,10) = 0
-  COEF(1,21) = (0.06790915713070725, 0)
-    DEG(1,22,1) = 1
-    DEG(1,22,2) = 0
-    DEG(1,22,3) = 1
-    DEG(1,22,4) = 0
-    DEG(1,22,5) = 1
-    DEG(1,22,6) = 0
-    DEG(1,22,7) = 0
-    DEG(1,22,8) = 0
-    DEG(1,22,9) = 0
-    DEG(1,22,10) = 0
-  COEF(1,22) = (-0.4309121044684771, 0)
-    DEG(1,23,1) = 0
-    DEG(1,23,2) = 1
-    DEG(1,23,3) = 1
-    DEG(1,23,4) = 0
-    DEG(1,23,5) = 1
-    DEG(1,23,6) = 0
-    DEG(1,23,7) = 0
-    DEG(1,23,8) = 0
-    DEG(1,23,9) = 0
-    DEG(1,23,10) = 0
-  COEF(1,23) = (0.9086272006283425, 0)
-    DEG(1,24,1) = 0
-    DEG(1,24,2) = 0
-    DEG(1,24,3) = 2
-    DEG(1,24,4) = 0
-    DEG(1,24,5) = 1
-    DEG(1,24,6) = 0
-    DEG(1,24,7) = 0
-    DEG(1,24,8) = 0
-    DEG(1,24,9) = 0
-    DEG(1,24,10) = 0
-  COEF(1,24) = (-0.2764931751394603, 0)
-    DEG(1,25,1) = 2
-    DEG(1,25,2) = 0
-    DEG(1,25,3) = 0
-    DEG(1,25,4) = 1
-    DEG(1,25,5) = 1
-    DEG(1,25,6) = 0
-    DEG(1,25,7) = 0
-    DEG(1,25,8) = 0
-    DEG(1,25,9) = 0
-    DEG(1,25,10) = 0
-  COEF(1,25) = (-1.8163349832174116, 0)
-    DEG(1,26,1) = 1
-    DEG(1,26,2) = 1
-    DEG(1,26,3) = 0
-    DEG(1,26,4) = 1
-    DEG(1,26,5) = 1
-    DEG(1,26,6) = 0
-    DEG(1,26,7) = 0
-    DEG(1,26,8) = 0
-    DEG(1,26,9) = 0
-    DEG(1,26,10) = 0
-  COEF(1,26) = (-0.9167144057621401, 0)
-    DEG(1,27,1) = 0
-    DEG(1,27,2) = 2
-    DEG(1,27,3) = 0
-    DEG(1,27,4) = 1
-    DEG(1,27,5) = 1
-    DEG(1,27,6) = 0
-    DEG(1,27,7) = 0
-    DEG(1,27,8) = 0
-    DEG(1,27,9) = 0
-    DEG(1,27,10) = 0
-  COEF(1,27) = (1.0203368504488892, 0)
-    DEG(1,28,1) = 1
-    DEG(1,28,2) = 0
-    DEG(1,28,3) = 1
-    DEG(1,28,4) = 1
-    DEG(1,28,5) = 1
-    DEG(1,28,6) = 0
-    DEG(1,28,7) = 0
-    DEG(1,28,8) = 0
-    DEG(1,28,9) = 0
-    DEG(1,28,10) = 0
-  COEF(1,28) = (-0.23194646823111892, 0)
-    DEG(1,29,1) = 0
-    DEG(1,29,2) = 1
-    DEG(1,29,3) = 1
-    DEG(1,29,4) = 1
-    DEG(1,29,5) = 1
-    DEG(1,29,6) = 0
-    DEG(1,29,7) = 0
-    DEG(1,29,8) = 0
-    DEG(1,29,9) = 0
-    DEG(1,29,10) = 0
-  COEF(1,29) = (0.539670777307627, 0)
-    DEG(1,30,1) = 0
-    DEG(1,30,2) = 0
-    DEG(1,30,3) = 2
-    DEG(1,30,4) = 1
-    DEG(1,30,5) = 1
-    DEG(1,30,6) = 0
-    DEG(1,30,7) = 0
-    DEG(1,30,8) = 0
-    DEG(1,30,9) = 0
-    DEG(1,30,10) = 0
-  COEF(1,30) = (0.7959981327685224, 0)
-    DEG(1,31,1) = 2
-    DEG(1,31,2) = 0
-    DEG(1,31,3) = 0
-    DEG(1,31,4) = 0
-    DEG(1,31,5) = 2
-    DEG(1,31,6) = 0
-    DEG(1,31,7) = 0
-    DEG(1,31,8) = 0
-    DEG(1,31,9) = 0
-    DEG(1,31,10) = 0
-  COEF(1,31) = (0.08717268867521591, 0)
-    DEG(1,32,1) = 1
-    DEG(1,32,2) = 1
-    DEG(1,32,3) = 0
-    DEG(1,32,4) = 0
-    DEG(1,32,5) = 2
-    DEG(1,32,6) = 0
-    DEG(1,32,7) = 0
-    DEG(1,32,8) = 0
-    DEG(1,32,9) = 0
-    DEG(1,32,10) = 0
-  COEF(1,32) = (0.9504154644263471, 0)
-    DEG(1,33,1) = 0
-    DEG(1,33,2) = 2
-    DEG(1,33,3) = 0
-    DEG(1,33,4) = 0
-    DEG(1,33,5) = 2
-    DEG(1,33,6) = 0
-    DEG(1,33,7) = 0
-    DEG(1,33,8) = 0
-    DEG(1,33,9) = 0
-    DEG(1,33,10) = 0
-  COEF(1,33) = (-0.48206756571420756, 0)
-    DEG(1,34,1) = 1
-    DEG(1,34,2) = 0
-    DEG(1,34,3) = 1
-    DEG(1,34,4) = 0
-    DEG(1,34,5) = 2
-    DEG(1,34,6) = 0
-    DEG(1,34,7) = 0
-    DEG(1,34,8) = 0
-    DEG(1,34,9) = 0
-    DEG(1,34,10) = 0
-  COEF(1,34) = (-1.065062423127697, 0)
-    DEG(1,35,1) = 0
-    DEG(1,35,2) = 1
-    DEG(1,35,3) = 1
-    DEG(1,35,4) = 0
-    DEG(1,35,5) = 2
-    DEG(1,35,6) = 0
-    DEG(1,35,7) = 0
-    DEG(1,35,8) = 0
-    DEG(1,35,9) = 0
-    DEG(1,35,10) = 0
-  COEF(1,35) = (0.1209952909274163, 0)
-    DEG(1,36,1) = 0
-    DEG(1,36,2) = 0
-    DEG(1,36,3) = 2
-    DEG(1,36,4) = 0
-    DEG(1,36,5) = 2
-    DEG(1,36,6) = 0
-    DEG(1,36,7) = 0
-    DEG(1,36,8) = 0
-    DEG(1,36,9) = 0
-    DEG(1,36,10) = 0
-  COEF(1,36) = (0.3948948770389917, 0)
-    DEG(1,37,1) = 2
-    DEG(1,37,2) = 0
-    DEG(1,37,3) = 0
-    DEG(1,37,4) = 0
-    DEG(1,37,5) = 0
-    DEG(1,37,6) = 1
-    DEG(1,37,7) = 0
-    DEG(1,37,8) = 0
-    DEG(1,37,9) = 0
-    DEG(1,37,10) = 0
-  COEF(1,37) = (0.289766299873838, 0)
-    DEG(1,38,1) = 1
-    DEG(1,38,2) = 1
-    DEG(1,38,3) = 0
-    DEG(1,38,4) = 0
-    DEG(1,38,5) = 0
-    DEG(1,38,6) = 1
-    DEG(1,38,7) = 0
-    DEG(1,38,8) = 0
-    DEG(1,38,9) = 0
-    DEG(1,38,10) = 0
-  COEF(1,38) = (-1.2778927965251532, 0)
-    DEG(1,39,1) = 0
-    DEG(1,39,2) = 2
-    DEG(1,39,3) = 0
-    DEG(1,39,4) = 0
-    DEG(1,39,5) = 0
-    DEG(1,39,6) = 1
-    DEG(1,39,7) = 0
-    DEG(1,39,8) = 0
-    DEG(1,39,9) = 0
-    DEG(1,39,10) = 0
-  COEF(1,39) = (0.9087896778886251, 0)
-    DEG(1,40,1) = 1
-    DEG(1,40,2) = 0
-    DEG(1,40,3) = 1
-    DEG(1,40,4) = 0
-    DEG(1,40,5) = 0
-    DEG(1,40,6) = 1
-    DEG(1,40,7) = 0
-    DEG(1,40,8) = 0
-    DEG(1,40,9) = 0
-    DEG(1,40,10) = 0
-  COEF(1,40) = (-0.5812612591154215, 0)
-    DEG(1,41,1) = 0
-    DEG(1,41,2) = 1
-    DEG(1,41,3) = 1
-    DEG(1,41,4) = 0
-    DEG(1,41,5) = 0
-    DEG(1,41,6) = 1
-    DEG(1,41,7) = 0
-    DEG(1,41,8) = 0
-    DEG(1,41,9) = 0
-    DEG(1,41,10) = 0
-  COEF(1,41) = (-0.7595904624983555, 0)
-    DEG(1,42,1) = 0
-    DEG(1,42,2) = 0
-    DEG(1,42,3) = 2
-    DEG(1,42,4) = 0
-    DEG(1,42,5) = 0
-    DEG(1,42,6) = 1
-    DEG(1,42,7) = 0
-    DEG(1,42,8) = 0
-    DEG(1,42,9) = 0
-    DEG(1,42,10) = 0
-  COEF(1,42) = (0.5084892760496751, 0)
-    DEG(1,43,1) = 2
-    DEG(1,43,2) = 0
-    DEG(1,43,3) = 0
-    DEG(1,43,4) = 1
-    DEG(1,43,5) = 0
-    DEG(1,43,6) = 1
-    DEG(1,43,7) = 0
-    DEG(1,43,8) = 0
-    DEG(1,43,9) = 0
-    DEG(1,43,10) = 0
-  COEF(1,43) = (-0.3268802641947883, 0)
-    DEG(1,44,1) = 1
-    DEG(1,44,2) = 1
-    DEG(1,44,3) = 0
-    DEG(1,44,4) = 1
-    DEG(1,44,5) = 0
-    DEG(1,44,6) = 1
-    DEG(1,44,7) = 0
-    DEG(1,44,8) = 0
-    DEG(1,44,9) = 0
-    DEG(1,44,10) = 0
-  COEF(1,44) = (0.657630238424344, 0)
-    DEG(1,45,1) = 0
-    DEG(1,45,2) = 2
-    DEG(1,45,3) = 0
-    DEG(1,45,4) = 1
-    DEG(1,45,5) = 0
-    DEG(1,45,6) = 1
-    DEG(1,45,7) = 0
-    DEG(1,45,8) = 0
-    DEG(1,45,9) = 0
-    DEG(1,45,10) = 0
-  COEF(1,45) = (1.1093919363972093, 0)
-    DEG(1,46,1) = 1
-    DEG(1,46,2) = 0
-    DEG(1,46,3) = 1
-    DEG(1,46,4) = 1
-    DEG(1,46,5) = 0
-    DEG(1,46,6) = 1
-    DEG(1,46,7) = 0
-    DEG(1,46,8) = 0
-    DEG(1,46,9) = 0
-    DEG(1,46,10) = 0
-  COEF(1,46) = (0.4551393419480071, 0)
-    DEG(1,47,1) = 0
-    DEG(1,47,2) = 1
-    DEG(1,47,3) = 1
-    DEG(1,47,4) = 1
-    DEG(1,47,5) = 0
-    DEG(1,47,6) = 1
-    DEG(1,47,7) = 0
-    DEG(1,47,8) = 0
-    DEG(1,47,9) = 0
-    DEG(1,47,10) = 0
-  COEF(1,47) = (1.8553852513069364, 0)
-    DEG(1,48,1) = 0
-    DEG(1,48,2) = 0
-    DEG(1,48,3) = 2
-    DEG(1,48,4) = 1
-    DEG(1,48,5) = 0
-    DEG(1,48,6) = 1
-    DEG(1,48,7) = 0
-    DEG(1,48,8) = 0
-    DEG(1,48,9) = 0
-    DEG(1,48,10) = 0
-  COEF(1,48) = (-0.7825116722024211, 0)
-    DEG(1,49,1) = 2
-    DEG(1,49,2) = 0
-    DEG(1,49,3) = 0
-    DEG(1,49,4) = 0
-    DEG(1,49,5) = 1
-    DEG(1,49,6) = 1
-    DEG(1,49,7) = 0
-    DEG(1,49,8) = 0
-    DEG(1,49,9) = 0
-    DEG(1,49,10) = 0
-  COEF(1,49) = (0.5810469298461638, 0)
-    DEG(1,50,1) = 1
-    DEG(1,50,2) = 1
-    DEG(1,50,3) = 0
-    DEG(1,50,4) = 0
-    DEG(1,50,5) = 1
-    DEG(1,50,6) = 1
-    DEG(1,50,7) = 0
-    DEG(1,50,8) = 0
-    DEG(1,50,9) = 0
-    DEG(1,50,10) = 0
-  COEF(1,50) = (-1.1557382363783264, 0)
-    DEG(1,51,1) = 0
-    DEG(1,51,2) = 2
-    DEG(1,51,3) = 0
-    DEG(1,51,4) = 0
-    DEG(1,51,5) = 1
-    DEG(1,51,6) = 1
-    DEG(1,51,7) = 0
-    DEG(1,51,8) = 0
-    DEG(1,51,9) = 0
-    DEG(1,51,10) = 0
-  COEF(1,51) = (-0.11367961187637783, 0)
-    DEG(1,52,1) = 1
-    DEG(1,52,2) = 0
-    DEG(1,52,3) = 1
-    DEG(1,52,4) = 0
-    DEG(1,52,5) = 1
-    DEG(1,52,6) = 1
-    DEG(1,52,7) = 0
-    DEG(1,52,8) = 0
-    DEG(1,52,9) = 0
-    DEG(1,52,10) = 0
-  COEF(1,52) = (1.7077140933509898, 0)
-    DEG(1,53,1) = 0
-    DEG(1,53,2) = 1
-    DEG(1,53,3) = 1
-    DEG(1,53,4) = 0
-    DEG(1,53,5) = 1
-    DEG(1,53,6) = 1
-    DEG(1,53,7) = 0
-    DEG(1,53,8) = 0
-    DEG(1,53,9) = 0
-    DEG(1,53,10) = 0
-  COEF(1,53) = (-0.36547942767108677, 0)
-    DEG(1,54,1) = 0
-    DEG(1,54,2) = 0
-    DEG(1,54,3) = 2
-    DEG(1,54,4) = 0
-    DEG(1,54,5) = 1
-    DEG(1,54,6) = 1
-    DEG(1,54,7) = 0
-    DEG(1,54,8) = 0
-    DEG(1,54,9) = 0
-    DEG(1,54,10) = 0
-  COEF(1,54) = (-0.4673673179697859, 0)
-    DEG(1,55,1) = 2
-    DEG(1,55,2) = 0
-    DEG(1,55,3) = 0
-    DEG(1,55,4) = 0
-    DEG(1,55,5) = 0
-    DEG(1,55,6) = 2
-    DEG(1,55,7) = 0
-    DEG(1,55,8) = 0
-    DEG(1,55,9) = 0
-    DEG(1,55,10) = 0
-  COEF(1,55) = (0.12034280775306151, 0)
-    DEG(1,56,1) = 1
-    DEG(1,56,2) = 1
-    DEG(1,56,3) = 0
-    DEG(1,56,4) = 0
-    DEG(1,56,5) = 0
-    DEG(1,56,6) = 2
-    DEG(1,56,7) = 0
-    DEG(1,56,8) = 0
-    DEG(1,56,9) = 0
-    DEG(1,56,10) = 0
-  COEF(1,56) = (-0.5733857796356615, 0)
-    DEG(1,57,1) = 0
-    DEG(1,57,2) = 2
-    DEG(1,57,3) = 0
-    DEG(1,57,4) = 0
-    DEG(1,57,5) = 0
-    DEG(1,57,6) = 2
-    DEG(1,57,7) = 0
-    DEG(1,57,8) = 0
-    DEG(1,57,9) = 0
-    DEG(1,57,10) = 0
-  COEF(1,57) = (0.6489566339058018, 0)
-    DEG(1,58,1) = 1
-    DEG(1,58,2) = 0
-    DEG(1,58,3) = 1
-    DEG(1,58,4) = 0
-    DEG(1,58,5) = 0
-    DEG(1,58,6) = 2
-    DEG(1,58,7) = 0
-    DEG(1,58,8) = 0
-    DEG(1,58,9) = 0
-    DEG(1,58,10) = 0
-  COEF(1,58) = (0.2663669912953945, 0)
-    DEG(1,59,1) = 0
-    DEG(1,59,2) = 1
-    DEG(1,59,3) = 1
-    DEG(1,59,4) = 0
-    DEG(1,59,5) = 0
-    DEG(1,59,6) = 2
-    DEG(1,59,7) = 0
-    DEG(1,59,8) = 0
-    DEG(1,59,9) = 0
-    DEG(1,59,10) = 0
-  COEF(1,59) = (-0.9878214357030672, 0)
-    DEG(1,60,1) = 0
-    DEG(1,60,2) = 0
-    DEG(1,60,3) = 2
-    DEG(1,60,4) = 0
-    DEG(1,60,5) = 0
-    DEG(1,60,6) = 2
-    DEG(1,60,7) = 0
-    DEG(1,60,8) = 0
-    DEG(1,60,9) = 0
-    DEG(1,60,10) = 0
-  COEF(1,60) = (-0.7692994416588633, 0)
-    DEG(1,61,1) = 0
-    DEG(1,61,2) = 0
-    DEG(1,61,3) = 0
-    DEG(1,61,4) = 0
-    DEG(1,61,5) = 0
-    DEG(1,61,6) = 0
-    DEG(1,61,7) = 1
-    DEG(1,61,8) = 0
-    DEG(1,61,9) = 0
-    DEG(1,61,10) = 0
-  COEF(1,61) = (-0.19466145678474384, 0)
-    DEG(1,62,1) = 0
-    DEG(1,62,2) = 0
-    DEG(1,62,3) = 0
-    DEG(1,62,4) = 1
-    DEG(1,62,5) = 0
-    DEG(1,62,6) = 0
-    DEG(1,62,7) = 1
-    DEG(1,62,8) = 0
-    DEG(1,62,9) = 0
-    DEG(1,62,10) = 0
-  COEF(1,62) = (-0.7153041427190404, 0)
-    DEG(1,63,1) = 0
-    DEG(1,63,2) = 0
-    DEG(1,63,3) = 0
-    DEG(1,63,4) = 0
-    DEG(1,63,5) = 1
-    DEG(1,63,6) = 0
-    DEG(1,63,7) = 1
-    DEG(1,63,8) = 0
-    DEG(1,63,9) = 0
-    DEG(1,63,10) = 0
-  COEF(1,63) = (-1.3528776260043915, 0)
-    DEG(1,64,1) = 0
-    DEG(1,64,2) = 0
-    DEG(1,64,3) = 0
-    DEG(1,64,4) = 0
-    DEG(1,64,5) = 0
-    DEG(1,64,6) = 1
-    DEG(1,64,7) = 1
-    DEG(1,64,8) = 0
-    DEG(1,64,9) = 0
-    DEG(1,64,10) = 0
-  COEF(1,64) = (-1.7070452538121381, 0)
-    DEG(1,65,1) = 0
-    DEG(1,65,2) = 0
-    DEG(1,65,3) = 0
-    DEG(1,65,4) = 0
-    DEG(1,65,5) = 0
-    DEG(1,65,6) = 0
-    DEG(1,65,7) = 0
-    DEG(1,65,8) = 1
-    DEG(1,65,9) = 0
-    DEG(1,65,10) = 0
-  COEF(1,65) = (-1.0516635822669562, 0)
-    DEG(1,66,1) = 0
-    DEG(1,66,2) = 0
-    DEG(1,66,3) = 0
-    DEG(1,66,4) = 1
-    DEG(1,66,5) = 0
-    DEG(1,66,6) = 0
-    DEG(1,66,7) = 0
-    DEG(1,66,8) = 1
-    DEG(1,66,9) = 0
-    DEG(1,66,10) = 0
-  COEF(1,66) = (1.2244185478631853, 0)
-    DEG(1,67,1) = 0
-    DEG(1,67,2) = 0
-    DEG(1,67,3) = 0
-    DEG(1,67,4) = 0
-    DEG(1,67,5) = 1
-    DEG(1,67,6) = 0
-    DEG(1,67,7) = 0
-    DEG(1,67,8) = 1
-    DEG(1,67,9) = 0
-    DEG(1,67,10) = 0
-  COEF(1,67) = (-0.05844567698552443, 0)
-    DEG(1,68,1) = 0
-    DEG(1,68,2) = 0
-    DEG(1,68,3) = 0
-    DEG(1,68,4) = 0
-    DEG(1,68,5) = 0
-    DEG(1,68,6) = 1
-    DEG(1,68,7) = 0
-    DEG(1,68,8) = 1
-    DEG(1,68,9) = 0
-    DEG(1,68,10) = 0
-  COEF(1,68) = (-0.37706149953585283, 0)
-    DEG(1,69,1) = 0
-    DEG(1,69,2) = 0
-    DEG(1,69,3) = 0
-    DEG(1,69,4) = 0
-    DEG(1,69,5) = 0
-    DEG(1,69,6) = 0
-    DEG(1,69,7) = 0
-    DEG(1,69,8) = 0
-    DEG(1,69,9) = 1
-    DEG(1,69,10) = 0
-  COEF(1,69) = (0.580102254517945, 0)
-    DEG(1,70,1) = 0
-    DEG(1,70,2) = 0
-    DEG(1,70,3) = 0
-    DEG(1,70,4) = 1
-    DEG(1,70,5) = 0
-    DEG(1,70,6) = 0
-    DEG(1,70,7) = 0
-    DEG(1,70,8) = 0
-    DEG(1,70,9) = 1
-    DEG(1,70,10) = 0
-  COEF(1,70) = (1.2898860704586343, 0)
-    DEG(1,71,1) = 0
-    DEG(1,71,2) = 0
-    DEG(1,71,3) = 0
-    DEG(1,71,4) = 0
-    DEG(1,71,5) = 1
-    DEG(1,71,6) = 0
-    DEG(1,71,7) = 0
-    DEG(1,71,8) = 0
-    DEG(1,71,9) = 1
-    DEG(1,71,10) = 0
-  COEF(1,71) = (-0.6655948497180294, 0)
-    DEG(1,72,1) = 0
-    DEG(1,72,2) = 0
-    DEG(1,72,3) = 0
-    DEG(1,72,4) = 0
-    DEG(1,72,5) = 0
-    DEG(1,72,6) = 1
-    DEG(1,72,7) = 0
-    DEG(1,72,8) = 0
-    DEG(1,72,9) = 1
-    DEG(1,72,10) = 0
-  COEF(1,72) = (0.697758704890495, 0)
-    DEG(1,73,1) = 0
-    DEG(1,73,2) = 0
-    DEG(1,73,3) = 0
-    DEG(1,73,4) = 0
-    DEG(1,73,5) = 0
-    DEG(1,73,6) = 0
-    DEG(1,73,7) = 0
-    DEG(1,73,8) = 0
-    DEG(1,73,9) = 0
-    DEG(1,73,10) = 1
-  COEF(1,73) = (-0.042921436747585445, 0)
-    DEG(1,74,1) = 0
-    DEG(1,74,2) = 0
-    DEG(1,74,3) = 0
-    DEG(1,74,4) = 1
-    DEG(1,74,5) = 0
-    DEG(1,74,6) = 0
-    DEG(1,74,7) = 0
-    DEG(1,74,8) = 0
-    DEG(1,74,9) = 0
-    DEG(1,74,10) = 1
-  COEF(1,74) = (0.5172073855756967, 0)
-    DEG(1,75,1) = 0
-    DEG(1,75,2) = 0
-    DEG(1,75,3) = 0
-    DEG(1,75,4) = 0
-    DEG(1,75,5) = 1
-    DEG(1,75,6) = 0
-    DEG(1,75,7) = 0
-    DEG(1,75,8) = 0
-    DEG(1,75,9) = 0
-    DEG(1,75,10) = 1
-  COEF(1,75) = (0.6917094054122289, 0)
-    DEG(1,76,1) = 0
-    DEG(1,76,2) = 0
-    DEG(1,76,3) = 0
-    DEG(1,76,4) = 0
-    DEG(1,76,5) = 0
-    DEG(1,76,6) = 1
-    DEG(1,76,7) = 0
-    DEG(1,76,8) = 0
-    DEG(1,76,9) = 0
-    DEG(1,76,10) = 1
-  COEF(1,76) = (-1.4579672250860476, 0)
-
-NUM_TERMS(2) = 76
-    DEG(2,1,1) = 2
-    DEG(2,1,2) = 0
-    DEG(2,1,3) = 0
-    DEG(2,1,4) = 0
-    DEG(2,1,5) = 0
-    DEG(2,1,6) = 0
-    DEG(2,1,7) = 0
-    DEG(2,1,8) = 0
-    DEG(2,1,9) = 0
-    DEG(2,1,10) = 0
-  COEF(2,1) = (0.16011034303688113, 0)
-    DEG(2,2,1) = 1
-    DEG(2,2,2) = 1
-    DEG(2,2,3) = 0
-    DEG(2,2,4) = 0
-    DEG(2,2,5) = 0
-    DEG(2,2,6) = 0
-    DEG(2,2,7) = 0
-    DEG(2,2,8) = 0
-    DEG(2,2,9) = 0
-    DEG(2,2,10) = 0
-  COEF(2,2) = (-0.9005468824403076, 0)
-    DEG(2,3,1) = 0
-    DEG(2,3,2) = 2
-    DEG(2,3,3) = 0
-    DEG(2,3,4) = 0
-    DEG(2,3,5) = 0
-    DEG(2,3,6) = 0
-    DEG(2,3,7) = 0
-    DEG(2,3,8) = 0
-    DEG(2,3,9) = 0
-    DEG(2,3,10) = 0
-  COEF(2,3) = (-0.3519015838689263, 0)
-    DEG(2,4,1) = 1
-    DEG(2,4,2) = 0
-    DEG(2,4,3) = 1
-    DEG(2,4,4) = 0
-    DEG(2,4,5) = 0
-    DEG(2,4,6) = 0
-    DEG(2,4,7) = 0
-    DEG(2,4,8) = 0
-    DEG(2,4,9) = 0
-    DEG(2,4,10) = 0
-  COEF(2,4) = (0.5202586158306898, 0)
-    DEG(2,5,1) = 0
-    DEG(2,5,2) = 1
-    DEG(2,5,3) = 1
-    DEG(2,5,4) = 0
-    DEG(2,5,5) = 0
-    DEG(2,5,6) = 0
-    DEG(2,5,7) = 0
-    DEG(2,5,8) = 0
-    DEG(2,5,9) = 0
-    DEG(2,5,10) = 0
-  COEF(2,5) = (0.908682123022068, 0)
-    DEG(2,6,1) = 0
-    DEG(2,6,2) = 0
-    DEG(2,6,3) = 2
-    DEG(2,6,4) = 0
-    DEG(2,6,5) = 0
-    DEG(2,6,6) = 0
-    DEG(2,6,7) = 0
-    DEG(2,6,8) = 0
-    DEG(2,6,9) = 0
-    DEG(2,6,10) = 0
-  COEF(2,6) = (-0.4464562170645777, 0)
-    DEG(2,7,1) = 2
-    DEG(2,7,2) = 0
-    DEG(2,7,3) = 0
-    DEG(2,7,4) = 1
-    DEG(2,7,5) = 0
-    DEG(2,7,6) = 0
-    DEG(2,7,7) = 0
-    DEG(2,7,8) = 0
-    DEG(2,7,9) = 0
-    DEG(2,7,10) = 0
-  COEF(2,7) = (-0.13844524415679324, 0)
-    DEG(2,8,1) = 1
-    DEG(2,8,2) = 1
-    DEG(2,8,3) = 0
-    DEG(2,8,4) = 1
-    DEG(2,8,5) = 0
-    DEG(2,8,6) = 0
-    DEG(2,8,7) = 0
-    DEG(2,8,8) = 0
-    DEG(2,8,9) = 0
-    DEG(2,8,10) = 0
-  COEF(2,8) = (1.5568085644333742, 0)
-    DEG(2,9,1) = 0
-    DEG(2,9,2) = 2
-    DEG(2,9,3) = 0
-    DEG(2,9,4) = 1
-    DEG(2,9,5) = 0
-    DEG(2,9,6) = 0
-    DEG(2,9,7) = 0
-    DEG(2,9,8) = 0
-    DEG(2,9,9) = 0
-    DEG(2,9,10) = 0
-  COEF(2,9) = (1.6863862382239232, 0)
-    DEG(2,10,1) = 1
-    DEG(2,10,2) = 0
-    DEG(2,10,3) = 1
-    DEG(2,10,4) = 1
-    DEG(2,10,5) = 0
-    DEG(2,10,6) = 0
-    DEG(2,10,7) = 0
-    DEG(2,10,8) = 0
-    DEG(2,10,9) = 0
-    DEG(2,10,10) = 0
-  COEF(2,10) = (-1.7409458121154344, 0)
-    DEG(2,11,1) = 0
-    DEG(2,11,2) = 1
-    DEG(2,11,3) = 1
-    DEG(2,11,4) = 1
-    DEG(2,11,5) = 0
-    DEG(2,11,6) = 0
-    DEG(2,11,7) = 0
-    DEG(2,11,8) = 0
-    DEG(2,11,9) = 0
-    DEG(2,11,10) = 0
-  COEF(2,11) = (-0.13872356093602894, 0)
-    DEG(2,12,1) = 0
-    DEG(2,12,2) = 0
-    DEG(2,12,3) = 2
-    DEG(2,12,4) = 1
-    DEG(2,12,5) = 0
-    DEG(2,12,6) = 0
-    DEG(2,12,7) = 0
-    DEG(2,12,8) = 0
-    DEG(2,12,9) = 0
-    DEG(2,12,10) = 0
-  COEF(2,12) = (-0.5159047084859331, 0)
-    DEG(2,13,1) = 2
-    DEG(2,13,2) = 0
-    DEG(2,13,3) = 0
-    DEG(2,13,4) = 2
-    DEG(2,13,5) = 0
-    DEG(2,13,6) = 0
-    DEG(2,13,7) = 0
-    DEG(2,13,8) = 0
-    DEG(2,13,9) = 0
-    DEG(2,13,10) = 0
-  COEF(2,13) = (-0.2741643484200128, 0)
-    DEG(2,14,1) = 1
-    DEG(2,14,2) = 1
-    DEG(2,14,3) = 0
-    DEG(2,14,4) = 2
-    DEG(2,14,5) = 0
-    DEG(2,14,6) = 0
-    DEG(2,14,7) = 0
-    DEG(2,14,8) = 0
-    DEG(2,14,9) = 0
-    DEG(2,14,10) = 0
-  COEF(2,14) = (-0.34212012775550327, 0)
-    DEG(2,15,1) = 0
-    DEG(2,15,2) = 2
-    DEG(2,15,3) = 0
-    DEG(2,15,4) = 2
-    DEG(2,15,5) = 0
-    DEG(2,15,6) = 0
-    DEG(2,15,7) = 0
-    DEG(2,15,8) = 0
-    DEG(2,15,9) = 0
-    DEG(2,15,10) = 0
-  COEF(2,15) = (-0.07542436599114127, 0)
-    DEG(2,16,1) = 1
-    DEG(2,16,2) = 0
-    DEG(2,16,3) = 1
-    DEG(2,16,4) = 2
-    DEG(2,16,5) = 0
-    DEG(2,16,6) = 0
-    DEG(2,16,7) = 0
-    DEG(2,16,8) = 0
-    DEG(2,16,9) = 0
-    DEG(2,16,10) = 0
-  COEF(2,16) = (0.37458987278720324, 0)
-    DEG(2,17,1) = 0
-    DEG(2,17,2) = 1
-    DEG(2,17,3) = 1
-    DEG(2,17,4) = 2
-    DEG(2,17,5) = 0
-    DEG(2,17,6) = 0
-    DEG(2,17,7) = 0
-    DEG(2,17,8) = 0
-    DEG(2,17,9) = 0
-    DEG(2,17,10) = 0
-  COEF(2,17) = (0.4782561996467687, 0)
-    DEG(2,18,1) = 0
-    DEG(2,18,2) = 0
-    DEG(2,18,3) = 2
-    DEG(2,18,4) = 2
-    DEG(2,18,5) = 0
-    DEG(2,18,6) = 0
-    DEG(2,18,7) = 0
-    DEG(2,18,8) = 0
-    DEG(2,18,9) = 0
-    DEG(2,18,10) = 0
-  COEF(2,18) = (0.3495887144111541, 0)
-    DEG(2,19,1) = 2
-    DEG(2,19,2) = 0
-    DEG(2,19,3) = 0
-    DEG(2,19,4) = 0
-    DEG(2,19,5) = 1
-    DEG(2,19,6) = 0
-    DEG(2,19,7) = 0
-    DEG(2,19,8) = 0
-    DEG(2,19,9) = 0
-    DEG(2,19,10) = 0
-  COEF(2,19) = (0.41377445473869573, 0)
-    DEG(2,20,1) = 1
-    DEG(2,20,2) = 1
-    DEG(2,20,3) = 0
-    DEG(2,20,4) = 0
-    DEG(2,20,5) = 1
-    DEG(2,20,6) = 0
-    DEG(2,20,7) = 0
-    DEG(2,20,8) = 0
-    DEG(2,20,9) = 0
-    DEG(2,20,10) = 0
-  COEF(2,20) = (-1.5789383736211624, 0)
-    DEG(2,21,1) = 0
-    DEG(2,21,2) = 2
-    DEG(2,21,3) = 0
-    DEG(2,21,4) = 0
-    DEG(2,21,5) = 1
-    DEG(2,21,6) = 0
-    DEG(2,21,7) = 0
-    DEG(2,21,8) = 0
-    DEG(2,21,9) = 0
-    DEG(2,21,10) = 0
-  COEF(2,21) = (1.268319517294935, 0)
-    DEG(2,22,1) = 1
-    DEG(2,22,2) = 0
-    DEG(2,22,3) = 1
-    DEG(2,22,4) = 0
-    DEG(2,22,5) = 1
-    DEG(2,22,6) = 0
-    DEG(2,22,7) = 0
-    DEG(2,22,8) = 0
-    DEG(2,22,9) = 0
-    DEG(2,22,10) = 0
-  COEF(2,22) = (0.6163793667190677, 0)
-    DEG(2,23,1) = 0
-    DEG(2,23,2) = 1
-    DEG(2,23,3) = 1
-    DEG(2,23,4) = 0
-    DEG(2,23,5) = 1
-    DEG(2,23,6) = 0
-    DEG(2,23,7) = 0
-    DEG(2,23,8) = 0
-    DEG(2,23,9) = 0
-    DEG(2,23,10) = 0
-  COEF(2,23) = (-0.43374574206406646, 0)
-    DEG(2,24,1) = 0
-    DEG(2,24,2) = 0
-    DEG(2,24,3) = 2
-    DEG(2,24,4) = 0
-    DEG(2,24,5) = 1
-    DEG(2,24,6) = 0
-    DEG(2,24,7) = 0
-    DEG(2,24,8) = 0
-    DEG(2,24,9) = 0
-    DEG(2,24,10) = 0
-  COEF(2,24) = (-0.2061458017243186, 0)
-    DEG(2,25,1) = 2
-    DEG(2,25,2) = 0
-    DEG(2,25,3) = 0
-    DEG(2,25,4) = 1
-    DEG(2,25,5) = 1
-    DEG(2,25,6) = 0
-    DEG(2,25,7) = 0
-    DEG(2,25,8) = 0
-    DEG(2,25,9) = 0
-    DEG(2,25,10) = 0
-  COEF(2,25) = (0.14555549639831628, 0)
-    DEG(2,26,1) = 1
-    DEG(2,26,2) = 1
-    DEG(2,26,3) = 0
-    DEG(2,26,4) = 1
-    DEG(2,26,5) = 1
-    DEG(2,26,6) = 0
-    DEG(2,26,7) = 0
-    DEG(2,26,8) = 0
-    DEG(2,26,9) = 0
-    DEG(2,26,10) = 0
-  COEF(2,26) = (-1.1674745895517964, 0)
-    DEG(2,27,1) = 0
-    DEG(2,27,2) = 2
-    DEG(2,27,3) = 0
-    DEG(2,27,4) = 1
-    DEG(2,27,5) = 1
-    DEG(2,27,6) = 0
-    DEG(2,27,7) = 0
-    DEG(2,27,8) = 0
-    DEG(2,27,9) = 0
-    DEG(2,27,10) = 0
-  COEF(2,27) = (-0.9428064489876502, 0)
-    DEG(2,28,1) = 1
-    DEG(2,28,2) = 0
-    DEG(2,28,3) = 1
-    DEG(2,28,4) = 1
-    DEG(2,28,5) = 1
-    DEG(2,28,6) = 0
-    DEG(2,28,7) = 0
-    DEG(2,28,8) = 0
-    DEG(2,28,9) = 0
-    DEG(2,28,10) = 0
-  COEF(2,28) = (0.0024916775818734295, 0)
-    DEG(2,29,1) = 0
-    DEG(2,29,2) = 1
-    DEG(2,29,3) = 1
-    DEG(2,29,4) = 1
-    DEG(2,29,5) = 1
-    DEG(2,29,6) = 0
-    DEG(2,29,7) = 0
-    DEG(2,29,8) = 0
-    DEG(2,29,9) = 0
-    DEG(2,29,10) = 0
-  COEF(2,29) = (0.5291621555283466, 0)
-    DEG(2,30,1) = 0
-    DEG(2,30,2) = 0
-    DEG(2,30,3) = 2
-    DEG(2,30,4) = 1
-    DEG(2,30,5) = 1
-    DEG(2,30,6) = 0
-    DEG(2,30,7) = 0
-    DEG(2,30,8) = 0
-    DEG(2,30,9) = 0
-    DEG(2,30,10) = 0
-  COEF(2,30) = (0.7972509525893339, 0)
-    DEG(2,31,1) = 2
-    DEG(2,31,2) = 0
-    DEG(2,31,3) = 0
-    DEG(2,31,4) = 0
-    DEG(2,31,5) = 2
-    DEG(2,31,6) = 0
-    DEG(2,31,7) = 0
-    DEG(2,31,8) = 0
-    DEG(2,31,9) = 0
-    DEG(2,31,10) = 0
-  COEF(2,31) = (0.1807885464109201, 0)
-    DEG(2,32,1) = 1
-    DEG(2,32,2) = 1
-    DEG(2,32,3) = 0
-    DEG(2,32,4) = 0
-    DEG(2,32,5) = 2
-    DEG(2,32,6) = 0
-    DEG(2,32,7) = 0
-    DEG(2,32,8) = 0
-    DEG(2,32,9) = 0
-    DEG(2,32,10) = 0
-  COEF(2,32) = (0.9404541869824675, 0)
-    DEG(2,33,1) = 0
-    DEG(2,33,2) = 2
-    DEG(2,33,3) = 0
-    DEG(2,33,4) = 0
-    DEG(2,33,5) = 2
-    DEG(2,33,6) = 0
-    DEG(2,33,7) = 0
-    DEG(2,33,8) = 0
-    DEG(2,33,9) = 0
-    DEG(2,33,10) = 0
-  COEF(2,33) = (-0.5780030515551372, 0)
-    DEG(2,34,1) = 1
-    DEG(2,34,2) = 0
-    DEG(2,34,3) = 1
-    DEG(2,34,4) = 0
-    DEG(2,34,5) = 2
-    DEG(2,34,6) = 0
-    DEG(2,34,7) = 0
-    DEG(2,34,8) = 0
-    DEG(2,34,9) = 0
-    DEG(2,34,10) = 0
-  COEF(2,34) = (-1.0257418447585547, 0)
-    DEG(2,35,1) = 0
-    DEG(2,35,2) = 1
-    DEG(2,35,3) = 1
-    DEG(2,35,4) = 0
-    DEG(2,35,5) = 2
-    DEG(2,35,6) = 0
-    DEG(2,35,7) = 0
-    DEG(2,35,8) = 0
-    DEG(2,35,9) = 0
-    DEG(2,35,10) = 0
-  COEF(2,35) = (0.09251778173989315, 0)
-    DEG(2,36,1) = 0
-    DEG(2,36,2) = 0
-    DEG(2,36,3) = 2
-    DEG(2,36,4) = 0
-    DEG(2,36,5) = 2
-    DEG(2,36,6) = 0
-    DEG(2,36,7) = 0
-    DEG(2,36,8) = 0
-    DEG(2,36,9) = 0
-    DEG(2,36,10) = 0
-  COEF(2,36) = (0.39721450514421713, 0)
-    DEG(2,37,1) = 2
-    DEG(2,37,2) = 0
-    DEG(2,37,3) = 0
-    DEG(2,37,4) = 0
-    DEG(2,37,5) = 0
-    DEG(2,37,6) = 1
-    DEG(2,37,7) = 0
-    DEG(2,37,8) = 0
-    DEG(2,37,9) = 0
-    DEG(2,37,10) = 0
-  COEF(2,37) = (0.40272988912109214, 0)
-    DEG(2,38,1) = 1
-    DEG(2,38,2) = 1
-    DEG(2,38,3) = 0
-    DEG(2,38,4) = 0
-    DEG(2,38,5) = 0
-    DEG(2,38,6) = 1
-    DEG(2,38,7) = 0
-    DEG(2,38,8) = 0
-    DEG(2,38,9) = 0
-    DEG(2,38,10) = 0
-  COEF(2,38) = (-0.8272484673958682, 0)
-    DEG(2,39,1) = 0
-    DEG(2,39,2) = 2
-    DEG(2,39,3) = 0
-    DEG(2,39,4) = 0
-    DEG(2,39,5) = 0
-    DEG(2,39,6) = 1
-    DEG(2,39,7) = 0
-    DEG(2,39,8) = 0
-    DEG(2,39,9) = 0
-    DEG(2,39,10) = 0
-  COEF(2,39) = (1.057139636924469, 0)
-    DEG(2,40,1) = 1
-    DEG(2,40,2) = 0
-    DEG(2,40,3) = 1
-    DEG(2,40,4) = 0
-    DEG(2,40,5) = 0
-    DEG(2,40,6) = 1
-    DEG(2,40,7) = 0
-    DEG(2,40,8) = 0
-    DEG(2,40,9) = 0
-    DEG(2,40,10) = 0
-  COEF(2,40) = (-0.12353226665002319, 0)
-    DEG(2,41,1) = 0
-    DEG(2,41,2) = 1
-    DEG(2,41,3) = 1
-    DEG(2,41,4) = 0
-    DEG(2,41,5) = 0
-    DEG(2,41,6) = 1
-    DEG(2,41,7) = 0
-    DEG(2,41,8) = 0
-    DEG(2,41,9) = 0
-    DEG(2,41,10) = 0
-  COEF(2,41) = (-2.5741855761862396, 0)
-    DEG(2,42,1) = 0
-    DEG(2,42,2) = 0
-    DEG(2,42,3) = 2
-    DEG(2,42,4) = 0
-    DEG(2,42,5) = 0
-    DEG(2,42,6) = 1
-    DEG(2,42,7) = 0
-    DEG(2,42,8) = 0
-    DEG(2,42,9) = 0
-    DEG(2,42,10) = 0
-  COEF(2,42) = (1.560474007685759, 0)
-    DEG(2,43,1) = 2
-    DEG(2,43,2) = 0
-    DEG(2,43,3) = 0
-    DEG(2,43,4) = 1
-    DEG(2,43,5) = 0
-    DEG(2,43,6) = 1
-    DEG(2,43,7) = 0
-    DEG(2,43,8) = 0
-    DEG(2,43,9) = 0
-    DEG(2,43,10) = 0
-  COEF(2,43) = (-0.6150996832616941, 0)
-    DEG(2,44,1) = 1
-    DEG(2,44,2) = 1
-    DEG(2,44,3) = 0
-    DEG(2,44,4) = 1
-    DEG(2,44,5) = 0
-    DEG(2,44,6) = 1
-    DEG(2,44,7) = 0
-    DEG(2,44,8) = 0
-    DEG(2,44,9) = 0
-    DEG(2,44,10) = 0
-  COEF(2,44) = (0.09937192239106099, 0)
-    DEG(2,45,1) = 0
-    DEG(2,45,2) = 2
-    DEG(2,45,3) = 0
-    DEG(2,45,4) = 1
-    DEG(2,45,5) = 0
-    DEG(2,45,6) = 1
-    DEG(2,45,7) = 0
-    DEG(2,45,8) = 0
-    DEG(2,45,9) = 0
-    DEG(2,45,10) = 0
-  COEF(2,45) = (0.8226042775491553, 0)
-    DEG(2,46,1) = 1
-    DEG(2,46,2) = 0
-    DEG(2,46,3) = 1
-    DEG(2,46,4) = 1
-    DEG(2,46,5) = 0
-    DEG(2,46,6) = 1
-    DEG(2,46,7) = 0
-    DEG(2,46,8) = 0
-    DEG(2,46,9) = 0
-    DEG(2,46,10) = 0
-  COEF(2,46) = (0.4732438203631739, 0)
-    DEG(2,47,1) = 0
-    DEG(2,47,2) = 1
-    DEG(2,47,3) = 1
-    DEG(2,47,4) = 1
-    DEG(2,47,5) = 0
-    DEG(2,47,6) = 1
-    DEG(2,47,7) = 0
-    DEG(2,47,8) = 0
-    DEG(2,47,9) = 0
-    DEG(2,47,10) = 0
-  COEF(2,47) = (1.6946050580334677, 0)
-    DEG(2,48,1) = 0
-    DEG(2,48,2) = 0
-    DEG(2,48,3) = 2
-    DEG(2,48,4) = 1
-    DEG(2,48,5) = 0
-    DEG(2,48,6) = 1
-    DEG(2,48,7) = 0
-    DEG(2,48,8) = 0
-    DEG(2,48,9) = 0
-    DEG(2,48,10) = 0
-  COEF(2,48) = (-0.20750459428746135, 0)
-    DEG(2,49,1) = 2
-    DEG(2,49,2) = 0
-    DEG(2,49,3) = 0
-    DEG(2,49,4) = 0
-    DEG(2,49,5) = 1
-    DEG(2,49,6) = 1
-    DEG(2,49,7) = 0
-    DEG(2,49,8) = 0
-    DEG(2,49,9) = 0
-    DEG(2,49,10) = 0
-  COEF(2,49) = (0.7556396990592089, 0)
-    DEG(2,50,1) = 1
-    DEG(2,50,2) = 1
-    DEG(2,50,3) = 0
-    DEG(2,50,4) = 0
-    DEG(2,50,5) = 1
-    DEG(2,50,6) = 1
-    DEG(2,50,7) = 0
-    DEG(2,50,8) = 0
-    DEG(2,50,9) = 0
-    DEG(2,50,10) = 0
-  COEF(2,50) = (-1.412614951501404, 0)
-    DEG(2,51,1) = 0
-    DEG(2,51,2) = 2
-    DEG(2,51,3) = 0
-    DEG(2,51,4) = 0
-    DEG(2,51,5) = 1
-    DEG(2,51,6) = 1
-    DEG(2,51,7) = 0
-    DEG(2,51,8) = 0
-    DEG(2,51,9) = 0
-    DEG(2,51,10) = 0
-  COEF(2,51) = (-0.09676545515565128, 0)
-    DEG(2,52,1) = 1
-    DEG(2,52,2) = 0
-    DEG(2,52,3) = 1
-    DEG(2,52,4) = 0
-    DEG(2,52,5) = 1
-    DEG(2,52,6) = 1
-    DEG(2,52,7) = 0
-    DEG(2,52,8) = 0
-    DEG(2,52,9) = 0
-    DEG(2,52,10) = 0
-  COEF(2,52) = (-0.9781576342585658, 0)
-    DEG(2,53,1) = 0
-    DEG(2,53,2) = 1
-    DEG(2,53,3) = 1
-    DEG(2,53,4) = 0
-    DEG(2,53,5) = 1
-    DEG(2,53,6) = 1
-    DEG(2,53,7) = 0
-    DEG(2,53,8) = 0
-    DEG(2,53,9) = 0
-    DEG(2,53,10) = 0
-  COEF(2,53) = (2.5006617995144724, 0)
-    DEG(2,54,1) = 0
-    DEG(2,54,2) = 0
-    DEG(2,54,3) = 2
-    DEG(2,54,4) = 0
-    DEG(2,54,5) = 1
-    DEG(2,54,6) = 1
-    DEG(2,54,7) = 0
-    DEG(2,54,8) = 0
-    DEG(2,54,9) = 0
-    DEG(2,54,10) = 0
-  COEF(2,54) = (-0.6588742439035575, 0)
-    DEG(2,55,1) = 2
-    DEG(2,55,2) = 0
-    DEG(2,55,3) = 0
-    DEG(2,55,4) = 0
-    DEG(2,55,5) = 0
-    DEG(2,55,6) = 2
-    DEG(2,55,7) = 0
-    DEG(2,55,8) = 0
-    DEG(2,55,9) = 0
-    DEG(2,55,10) = 0
-  COEF(2,55) = (0.09337580200909272, 0)
-    DEG(2,56,1) = 1
-    DEG(2,56,2) = 1
-    DEG(2,56,3) = 0
-    DEG(2,56,4) = 0
-    DEG(2,56,5) = 0
-    DEG(2,56,6) = 2
-    DEG(2,56,7) = 0
-    DEG(2,56,8) = 0
-    DEG(2,56,9) = 0
-    DEG(2,56,10) = 0
-  COEF(2,56) = (-0.5983340592269643, 0)
-    DEG(2,57,1) = 0
-    DEG(2,57,2) = 2
-    DEG(2,57,3) = 0
-    DEG(2,57,4) = 0
-    DEG(2,57,5) = 0
-    DEG(2,57,6) = 2
-    DEG(2,57,7) = 0
-    DEG(2,57,8) = 0
-    DEG(2,57,9) = 0
-    DEG(2,57,10) = 0
-  COEF(2,57) = (0.6534274175462785, 0)
-    DEG(2,58,1) = 1
-    DEG(2,58,2) = 0
-    DEG(2,58,3) = 1
-    DEG(2,58,4) = 0
-    DEG(2,58,5) = 0
-    DEG(2,58,6) = 2
-    DEG(2,58,7) = 0
-    DEG(2,58,8) = 0
-    DEG(2,58,9) = 0
-    DEG(2,58,10) = 0
-  COEF(2,58) = (0.6511519719713513, 0)
-    DEG(2,59,1) = 0
-    DEG(2,59,2) = 1
-    DEG(2,59,3) = 1
-    DEG(2,59,4) = 0
-    DEG(2,59,5) = 0
-    DEG(2,59,6) = 2
-    DEG(2,59,7) = 0
-    DEG(2,59,8) = 0
-    DEG(2,59,9) = 0
-    DEG(2,59,10) = 0
-  COEF(2,59) = (-0.5707739813866619, 0)
-    DEG(2,60,1) = 0
-    DEG(2,60,2) = 0
-    DEG(2,60,3) = 2
-    DEG(2,60,4) = 0
-    DEG(2,60,5) = 0
-    DEG(2,60,6) = 2
-    DEG(2,60,7) = 0
-    DEG(2,60,8) = 0
-    DEG(2,60,9) = 0
-    DEG(2,60,10) = 0
-  COEF(2,60) = (-0.7468032195553712, 0)
-    DEG(2,61,1) = 0
-    DEG(2,61,2) = 0
-    DEG(2,61,3) = 0
-    DEG(2,61,4) = 0
-    DEG(2,61,5) = 0
-    DEG(2,61,6) = 0
-    DEG(2,61,7) = 1
-    DEG(2,61,8) = 0
-    DEG(2,61,9) = 0
-    DEG(2,61,10) = 0
-  COEF(2,61) = (0.6382474578966228, 0)
-    DEG(2,62,1) = 0
-    DEG(2,62,2) = 0
-    DEG(2,62,3) = 0
-    DEG(2,62,4) = 1
-    DEG(2,62,5) = 0
-    DEG(2,62,6) = 0
-    DEG(2,62,7) = 1
-    DEG(2,62,8) = 0
-    DEG(2,62,9) = 0
-    DEG(2,62,10) = 0
-  COEF(2,62) = (-1.032036285581197, 0)
-    DEG(2,63,1) = 0
-    DEG(2,63,2) = 0
-    DEG(2,63,3) = 0
-    DEG(2,63,4) = 0
-    DEG(2,63,5) = 1
-    DEG(2,63,6) = 0
-    DEG(2,63,7) = 1
-    DEG(2,63,8) = 0
-    DEG(2,63,9) = 0
-    DEG(2,63,10) = 0
-  COEF(2,63) = (-1.4759481703093122, 0)
-    DEG(2,64,1) = 0
-    DEG(2,64,2) = 0
-    DEG(2,64,3) = 0
-    DEG(2,64,4) = 0
-    DEG(2,64,5) = 0
-    DEG(2,64,6) = 1
-    DEG(2,64,7) = 1
-    DEG(2,64,8) = 0
-    DEG(2,64,9) = 0
-    DEG(2,64,10) = 0
-  COEF(2,64) = (-3.0203435337313205, 0)
-    DEG(2,65,1) = 0
-    DEG(2,65,2) = 0
-    DEG(2,65,3) = 0
-    DEG(2,65,4) = 0
-    DEG(2,65,5) = 0
-    DEG(2,65,6) = 0
-    DEG(2,65,7) = 0
-    DEG(2,65,8) = 1
-    DEG(2,65,9) = 0
-    DEG(2,65,10) = 0
-  COEF(2,65) = (-0.22812438675350769, 0)
-    DEG(2,66,1) = 0
-    DEG(2,66,2) = 0
-    DEG(2,66,3) = 0
-    DEG(2,66,4) = 1
-    DEG(2,66,5) = 0
-    DEG(2,66,6) = 0
-    DEG(2,66,7) = 0
-    DEG(2,66,8) = 1
-    DEG(2,66,9) = 0
-    DEG(2,66,10) = 0
-  COEF(2,66) = (-0.2157590670168509, 0)
-    DEG(2,67,1) = 0
-    DEG(2,67,2) = 0
-    DEG(2,67,3) = 0
-    DEG(2,67,4) = 0
-    DEG(2,67,5) = 1
-    DEG(2,67,6) = 0
-    DEG(2,67,7) = 0
-    DEG(2,67,8) = 1
-    DEG(2,67,9) = 0
-    DEG(2,67,10) = 0
-  COEF(2,67) = (-0.1270558344695696, 0)
-    DEG(2,68,1) = 0
-    DEG(2,68,2) = 0
-    DEG(2,68,3) = 0
-    DEG(2,68,4) = 0
-    DEG(2,68,5) = 0
-    DEG(2,68,6) = 1
-    DEG(2,68,7) = 0
-    DEG(2,68,8) = 1
-    DEG(2,68,9) = 0
-    DEG(2,68,10) = 0
-  COEF(2,68) = (-0.5148593639524484, 0)
-    DEG(2,69,1) = 0
-    DEG(2,69,2) = 0
-    DEG(2,69,3) = 0
-    DEG(2,69,4) = 0
-    DEG(2,69,5) = 0
-    DEG(2,69,6) = 0
-    DEG(2,69,7) = 0
-    DEG(2,69,8) = 0
-    DEG(2,69,9) = 1
-    DEG(2,69,10) = 0
-  COEF(2,69) = (1.3667793800860086, 0)
-    DEG(2,70,1) = 0
-    DEG(2,70,2) = 0
-    DEG(2,70,3) = 0
-    DEG(2,70,4) = 1
-    DEG(2,70,5) = 0
-    DEG(2,70,6) = 0
-    DEG(2,70,7) = 0
-    DEG(2,70,8) = 0
-    DEG(2,70,9) = 1
-    DEG(2,70,10) = 0
-  COEF(2,70) = (-0.06171123442924746, 0)
-    DEG(2,71,1) = 0
-    DEG(2,71,2) = 0
-    DEG(2,71,3) = 0
-    DEG(2,71,4) = 0
-    DEG(2,71,5) = 1
-    DEG(2,71,6) = 0
-    DEG(2,71,7) = 0
-    DEG(2,71,8) = 0
-    DEG(2,71,9) = 1
-    DEG(2,71,10) = 0
-  COEF(2,71) = (-0.7314954155886625, 0)
-    DEG(2,72,1) = 0
-    DEG(2,72,2) = 0
-    DEG(2,72,3) = 0
-    DEG(2,72,4) = 0
-    DEG(2,72,5) = 0
-    DEG(2,72,6) = 1
-    DEG(2,72,7) = 0
-    DEG(2,72,8) = 0
-    DEG(2,72,9) = 1
-    DEG(2,72,10) = 0
-  COEF(2,72) = (0.7189348075213543, 0)
-    DEG(2,73,1) = 0
-    DEG(2,73,2) = 0
-    DEG(2,73,3) = 0
-    DEG(2,73,4) = 0
-    DEG(2,73,5) = 0
-    DEG(2,73,6) = 0
-    DEG(2,73,7) = 0
-    DEG(2,73,8) = 0
-    DEG(2,73,9) = 0
-    DEG(2,73,10) = 1
-  COEF(2,73) = (-0.902118536026858, 0)
-    DEG(2,74,1) = 0
-    DEG(2,74,2) = 0
-    DEG(2,74,3) = 0
-    DEG(2,74,4) = 1
-    DEG(2,74,5) = 0
-    DEG(2,74,6) = 0
-    DEG(2,74,7) = 0
-    DEG(2,74,8) = 0
-    DEG(2,74,9) = 0
-    DEG(2,74,10) = 1
-  COEF(2,74) = (0.43214823742186254, 0)
-    DEG(2,75,1) = 0
-    DEG(2,75,2) = 0
-    DEG(2,75,3) = 0
-    DEG(2,75,4) = 0
-    DEG(2,75,5) = 1
-    DEG(2,75,6) = 0
-    DEG(2,75,7) = 0
-    DEG(2,75,8) = 0
-    DEG(2,75,9) = 0
-    DEG(2,75,10) = 1
-  COEF(2,75) = (0.6677624868260497, 0)
-    DEG(2,76,1) = 0
-    DEG(2,76,2) = 0
-    DEG(2,76,3) = 0
-    DEG(2,76,4) = 0
-    DEG(2,76,5) = 0
-    DEG(2,76,6) = 1
-    DEG(2,76,7) = 0
-    DEG(2,76,8) = 0
-    DEG(2,76,9) = 0
-    DEG(2,76,10) = 1
-  COEF(2,76) = (0.5162571144422815, 0)
-
-NUM_TERMS(3) = 76
-    DEG(3,1,1) = 2
-    DEG(3,1,2) = 0
-    DEG(3,1,3) = 0
-    DEG(3,1,4) = 0
-    DEG(3,1,5) = 0
-    DEG(3,1,6) = 0
-    DEG(3,1,7) = 0
-    DEG(3,1,8) = 0
-    DEG(3,1,9) = 0
-    DEG(3,1,10) = 0
-  COEF(3,1) = (0.20816475809219404, 0)
-    DEG(3,2,1) = 1
-    DEG(3,2,2) = 1
-    DEG(3,2,3) = 0
-    DEG(3,2,4) = 0
-    DEG(3,2,5) = 0
-    DEG(3,2,6) = 0
-    DEG(3,2,7) = 0
-    DEG(3,2,8) = 0
-    DEG(3,2,9) = 0
-    DEG(3,2,10) = 0
-  COEF(3,2) = (-0.44624795696445435, 0)
-    DEG(3,3,1) = 0
-    DEG(3,3,2) = 2
-    DEG(3,3,3) = 0
-    DEG(3,3,4) = 0
-    DEG(3,3,5) = 0
-    DEG(3,3,6) = 0
-    DEG(3,3,7) = 0
-    DEG(3,3,8) = 0
-    DEG(3,3,9) = 0
-    DEG(3,3,10) = 0
-  COEF(3,3) = (0.1573457781818856, 0)
-    DEG(3,4,1) = 1
-    DEG(3,4,2) = 0
-    DEG(3,4,3) = 1
-    DEG(3,4,4) = 0
-    DEG(3,4,5) = 0
-    DEG(3,4,6) = 0
-    DEG(3,4,7) = 0
-    DEG(3,4,8) = 0
-    DEG(3,4,9) = 0
-    DEG(3,4,10) = 0
-  COEF(3,4) = (0.2432511536576595, 0)
-    DEG(3,5,1) = 0
-    DEG(3,5,2) = 1
-    DEG(3,5,3) = 1
-    DEG(3,5,4) = 0
-    DEG(3,5,5) = 0
-    DEG(3,5,6) = 0
-    DEG(3,5,7) = 0
-    DEG(3,5,8) = 0
-    DEG(3,5,9) = 0
-    DEG(3,5,10) = 0
-  COEF(3,5) = (-0.4587424991969163, 0)
-    DEG(3,6,1) = 0
-    DEG(3,6,2) = 0
-    DEG(3,6,3) = 2
-    DEG(3,6,4) = 0
-    DEG(3,6,5) = 0
-    DEG(3,6,6) = 0
-    DEG(3,6,7) = 0
-    DEG(3,6,8) = 0
-    DEG(3,6,9) = 0
-    DEG(3,6,10) = 0
-  COEF(3,6) = (-0.048748564896809544, 0)
-    DEG(3,7,1) = 2
-    DEG(3,7,2) = 0
-    DEG(3,7,3) = 0
-    DEG(3,7,4) = 1
-    DEG(3,7,5) = 0
-    DEG(3,7,6) = 0
-    DEG(3,7,7) = 0
-    DEG(3,7,8) = 0
-    DEG(3,7,9) = 0
-    DEG(3,7,10) = 0
-  COEF(3,7) = (-0.542424299098038, 0)
-    DEG(3,8,1) = 1
-    DEG(3,8,2) = 1
-    DEG(3,8,3) = 0
-    DEG(3,8,4) = 1
-    DEG(3,8,5) = 0
-    DEG(3,8,6) = 0
-    DEG(3,8,7) = 0
-    DEG(3,8,8) = 0
-    DEG(3,8,9) = 0
-    DEG(3,8,10) = 0
-  COEF(3,8) = (0.412606879197033, 0)
-    DEG(3,9,1) = 0
-    DEG(3,9,2) = 2
-    DEG(3,9,3) = 0
-    DEG(3,9,4) = 1
-    DEG(3,9,5) = 0
-    DEG(3,9,6) = 0
-    DEG(3,9,7) = 0
-    DEG(3,9,8) = 0
-    DEG(3,9,9) = 0
-    DEG(3,9,10) = 0
-  COEF(3,9) = (0.026228493490255755, 0)
-    DEG(3,10,1) = 1
-    DEG(3,10,2) = 0
-    DEG(3,10,3) = 1
-    DEG(3,10,4) = 1
-    DEG(3,10,5) = 0
-    DEG(3,10,6) = 0
-    DEG(3,10,7) = 0
-    DEG(3,10,8) = 0
-    DEG(3,10,9) = 0
-    DEG(3,10,10) = 0
-  COEF(3,10) = (-0.7135454436169615, 0)
-    DEG(3,11,1) = 0
-    DEG(3,11,2) = 1
-    DEG(3,11,3) = 1
-    DEG(3,11,4) = 1
-    DEG(3,11,5) = 0
-    DEG(3,11,6) = 0
-    DEG(3,11,7) = 0
-    DEG(3,11,8) = 0
-    DEG(3,11,9) = 0
-    DEG(3,11,10) = 0
-  COEF(3,11) = (0.38566725023570736, 0)
-    DEG(3,12,1) = 0
-    DEG(3,12,2) = 0
-    DEG(3,12,3) = 2
-    DEG(3,12,4) = 1
-    DEG(3,12,5) = 0
-    DEG(3,12,6) = 0
-    DEG(3,12,7) = 0
-    DEG(3,12,8) = 0
-    DEG(3,12,9) = 0
-    DEG(3,12,10) = 0
-  COEF(3,12) = (0.06641935708182738, 0)
-    DEG(3,13,1) = 2
-    DEG(3,13,2) = 0
-    DEG(3,13,3) = 0
-    DEG(3,13,4) = 2
-    DEG(3,13,5) = 0
-    DEG(3,13,6) = 0
-    DEG(3,13,7) = 0
-    DEG(3,13,8) = 0
-    DEG(3,13,9) = 0
-    DEG(3,13,10) = 0
-  COEF(3,13) = (0.1946156279601214, 0)
-    DEG(3,14,1) = 1
-    DEG(3,14,2) = 1
-    DEG(3,14,3) = 0
-    DEG(3,14,4) = 2
-    DEG(3,14,5) = 0
-    DEG(3,14,6) = 0
-    DEG(3,14,7) = 0
-    DEG(3,14,8) = 0
-    DEG(3,14,9) = 0
-    DEG(3,14,10) = 0
-  COEF(3,14) = (1.0726514255671113, 0)
-    DEG(3,15,1) = 0
-    DEG(3,15,2) = 2
-    DEG(3,15,3) = 0
-    DEG(3,15,4) = 2
-    DEG(3,15,5) = 0
-    DEG(3,15,6) = 0
-    DEG(3,15,7) = 0
-    DEG(3,15,8) = 0
-    DEG(3,15,9) = 0
-    DEG(3,15,10) = 0
-  COEF(3,15) = (-0.29746151974577967, 0)
-    DEG(3,16,1) = 1
-    DEG(3,16,2) = 0
-    DEG(3,16,3) = 1
-    DEG(3,16,4) = 2
-    DEG(3,16,5) = 0
-    DEG(3,16,6) = 0
-    DEG(3,16,7) = 0
-    DEG(3,16,8) = 0
-    DEG(3,16,9) = 0
-    DEG(3,16,10) = 0
-  COEF(3,16) = (0.3474150051655493, 0)
-    DEG(3,17,1) = 0
-    DEG(3,17,2) = 1
-    DEG(3,17,3) = 1
-    DEG(3,17,4) = 2
-    DEG(3,17,5) = 0
-    DEG(3,17,6) = 0
-    DEG(3,17,7) = 0
-    DEG(3,17,8) = 0
-    DEG(3,17,9) = 0
-    DEG(3,17,10) = 0
-  COEF(3,17) = (1.5662794253637933, 0)
-    DEG(3,18,1) = 0
-    DEG(3,18,2) = 0
-    DEG(3,18,3) = 2
-    DEG(3,18,4) = 2
-    DEG(3,18,5) = 0
-    DEG(3,18,6) = 0
-    DEG(3,18,7) = 0
-    DEG(3,18,8) = 0
-    DEG(3,18,9) = 0
-    DEG(3,18,10) = 0
-  COEF(3,18) = (0.10284589178565828, 0)
-    DEG(3,19,1) = 2
-    DEG(3,19,2) = 0
-    DEG(3,19,3) = 0
-    DEG(3,19,4) = 0
-    DEG(3,19,5) = 1
-    DEG(3,19,6) = 0
-    DEG(3,19,7) = 0
-    DEG(3,19,8) = 0
-    DEG(3,19,9) = 0
-    DEG(3,19,10) = 0
-  COEF(3,19) = (0.8655281158446179, 0)
-    DEG(3,20,1) = 1
-    DEG(3,20,2) = 1
-    DEG(3,20,3) = 0
-    DEG(3,20,4) = 0
-    DEG(3,20,5) = 1
-    DEG(3,20,6) = 0
-    DEG(3,20,7) = 0
-    DEG(3,20,8) = 0
-    DEG(3,20,9) = 0
-    DEG(3,20,10) = 0
-  COEF(3,20) = (-1.4227007533612923, 0)
-    DEG(3,21,1) = 0
-    DEG(3,21,2) = 2
-    DEG(3,21,3) = 0
-    DEG(3,21,4) = 0
-    DEG(3,21,5) = 1
-    DEG(3,21,6) = 0
-    DEG(3,21,7) = 0
-    DEG(3,21,8) = 0
-    DEG(3,21,9) = 0
-    DEG(3,21,10) = 0
-  COEF(3,21) = (-0.3561608986253729, 0)
-    DEG(3,22,1) = 1
-    DEG(3,22,2) = 0
-    DEG(3,22,3) = 1
-    DEG(3,22,4) = 0
-    DEG(3,22,5) = 1
-    DEG(3,22,6) = 0
-    DEG(3,22,7) = 0
-    DEG(3,22,8) = 0
-    DEG(3,22,9) = 0
-    DEG(3,22,10) = 0
-  COEF(3,22) = (-0.7002053827479838, 0)
-    DEG(3,23,1) = 0
-    DEG(3,23,2) = 1
-    DEG(3,23,3) = 1
-    DEG(3,23,4) = 0
-    DEG(3,23,5) = 1
-    DEG(3,23,6) = 0
-    DEG(3,23,7) = 0
-    DEG(3,23,8) = 0
-    DEG(3,23,9) = 0
-    DEG(3,23,10) = 0
-  COEF(3,23) = (0.1451263721376322, 0)
-    DEG(3,24,1) = 0
-    DEG(3,24,2) = 0
-    DEG(3,24,3) = 2
-    DEG(3,24,4) = 0
-    DEG(3,24,5) = 1
-    DEG(3,24,6) = 0
-    DEG(3,24,7) = 0
-    DEG(3,24,8) = 0
-    DEG(3,24,9) = 0
-    DEG(3,24,10) = 0
-  COEF(3,24) = (-0.4446427929457582, 0)
-    DEG(3,25,1) = 2
-    DEG(3,25,2) = 0
-    DEG(3,25,3) = 0
-    DEG(3,25,4) = 1
-    DEG(3,25,5) = 1
-    DEG(3,25,6) = 0
-    DEG(3,25,7) = 0
-    DEG(3,25,8) = 0
-    DEG(3,25,9) = 0
-    DEG(3,25,10) = 0
-  COEF(3,25) = (-0.35089234105147404, 0)
-    DEG(3,26,1) = 1
-    DEG(3,26,2) = 1
-    DEG(3,26,3) = 0
-    DEG(3,26,4) = 1
-    DEG(3,26,5) = 1
-    DEG(3,26,6) = 0
-    DEG(3,26,7) = 0
-    DEG(3,26,8) = 0
-    DEG(3,26,9) = 0
-    DEG(3,26,10) = 0
-  COEF(3,26) = (-1.8637325747105546, 0)
-    DEG(3,27,1) = 0
-    DEG(3,27,2) = 2
-    DEG(3,27,3) = 0
-    DEG(3,27,4) = 1
-    DEG(3,27,5) = 1
-    DEG(3,27,6) = 0
-    DEG(3,27,7) = 0
-    DEG(3,27,8) = 0
-    DEG(3,27,9) = 0
-    DEG(3,27,10) = 0
-  COEF(3,27) = (-0.7643910878410862, 0)
-    DEG(3,28,1) = 1
-    DEG(3,28,2) = 0
-    DEG(3,28,3) = 1
-    DEG(3,28,4) = 1
-    DEG(3,28,5) = 1
-    DEG(3,28,6) = 0
-    DEG(3,28,7) = 0
-    DEG(3,28,8) = 0
-    DEG(3,28,9) = 0
-    DEG(3,28,10) = 0
-  COEF(3,28) = (0.7421389633104346, 0)
-    DEG(3,29,1) = 0
-    DEG(3,29,2) = 1
-    DEG(3,29,3) = 1
-    DEG(3,29,4) = 1
-    DEG(3,29,5) = 1
-    DEG(3,29,6) = 0
-    DEG(3,29,7) = 0
-    DEG(3,29,8) = 0
-    DEG(3,29,9) = 0
-    DEG(3,29,10) = 0
-  COEF(3,29) = (0.8043890896223826, 0)
-    DEG(3,30,1) = 0
-    DEG(3,30,2) = 0
-    DEG(3,30,3) = 2
-    DEG(3,30,4) = 1
-    DEG(3,30,5) = 1
-    DEG(3,30,6) = 0
-    DEG(3,30,7) = 0
-    DEG(3,30,8) = 0
-    DEG(3,30,9) = 0
-    DEG(3,30,10) = 0
-  COEF(3,30) = (1.1152834288925604, 0)
-    DEG(3,31,1) = 2
-    DEG(3,31,2) = 0
-    DEG(3,31,3) = 0
-    DEG(3,31,4) = 0
-    DEG(3,31,5) = 2
-    DEG(3,31,6) = 0
-    DEG(3,31,7) = 0
-    DEG(3,31,8) = 0
-    DEG(3,31,9) = 0
-    DEG(3,31,10) = 0
-  COEF(3,31) = (-0.05058692105297476, 0)
-    DEG(3,32,1) = 1
-    DEG(3,32,2) = 1
-    DEG(3,32,3) = 0
-    DEG(3,32,4) = 0
-    DEG(3,32,5) = 2
-    DEG(3,32,6) = 0
-    DEG(3,32,7) = 0
-    DEG(3,32,8) = 0
-    DEG(3,32,9) = 0
-    DEG(3,32,10) = 0
-  COEF(3,32) = (-0.8545531093164939, 0)
-    DEG(3,33,1) = 0
-    DEG(3,33,2) = 2
-    DEG(3,33,3) = 0
-    DEG(3,33,4) = 0
-    DEG(3,33,5) = 2
-    DEG(3,33,6) = 0
-    DEG(3,33,7) = 0
-    DEG(3,33,8) = 0
-    DEG(3,33,9) = 0
-    DEG(3,33,10) = 0
-  COEF(3,33) = (-0.25045809562785276, 0)
-    DEG(3,34,1) = 1
-    DEG(3,34,2) = 0
-    DEG(3,34,3) = 1
-    DEG(3,34,4) = 0
-    DEG(3,34,5) = 2
-    DEG(3,34,6) = 0
-    DEG(3,34,7) = 0
-    DEG(3,34,8) = 0
-    DEG(3,34,9) = 0
-    DEG(3,34,10) = 0
-  COEF(3,34) = (-1.482438556873845, 0)
-    DEG(3,35,1) = 0
-    DEG(3,35,2) = 1
-    DEG(3,35,3) = 1
-    DEG(3,35,4) = 0
-    DEG(3,35,5) = 2
-    DEG(3,35,6) = 0
-    DEG(3,35,7) = 0
-    DEG(3,35,8) = 0
-    DEG(3,35,9) = 0
-    DEG(3,35,10) = 0
-  COEF(3,35) = (-0.2760311985894717, 0)
-    DEG(3,36,1) = 0
-    DEG(3,36,2) = 0
-    DEG(3,36,3) = 2
-    DEG(3,36,4) = 0
-    DEG(3,36,5) = 2
-    DEG(3,36,6) = 0
-    DEG(3,36,7) = 0
-    DEG(3,36,8) = 0
-    DEG(3,36,9) = 0
-    DEG(3,36,10) = 0
-  COEF(3,36) = (0.30104501668082756, 0)
-    DEG(3,37,1) = 2
-    DEG(3,37,2) = 0
-    DEG(3,37,3) = 0
-    DEG(3,37,4) = 0
-    DEG(3,37,5) = 0
-    DEG(3,37,6) = 1
-    DEG(3,37,7) = 0
-    DEG(3,37,8) = 0
-    DEG(3,37,9) = 0
-    DEG(3,37,10) = 0
-  COEF(3,37) = (0.41615153726461007, 0)
-    DEG(3,38,1) = 1
-    DEG(3,38,2) = 1
-    DEG(3,38,3) = 0
-    DEG(3,38,4) = 0
-    DEG(3,38,5) = 0
-    DEG(3,38,6) = 1
-    DEG(3,38,7) = 0
-    DEG(3,38,8) = 0
-    DEG(3,38,9) = 0
-    DEG(3,38,10) = 0
-  COEF(3,38) = (-1.6031132124173149, 0)
-    DEG(3,39,1) = 0
-    DEG(3,39,2) = 2
-    DEG(3,39,3) = 0
-    DEG(3,39,4) = 0
-    DEG(3,39,5) = 0
-    DEG(3,39,6) = 1
-    DEG(3,39,7) = 0
-    DEG(3,39,8) = 0
-    DEG(3,39,9) = 0
-    DEG(3,39,10) = 0
-  COEF(3,39) = (1.1652768530802575, 0)
-    DEG(3,40,1) = 1
-    DEG(3,40,2) = 0
-    DEG(3,40,3) = 1
-    DEG(3,40,4) = 0
-    DEG(3,40,5) = 0
-    DEG(3,40,6) = 1
-    DEG(3,40,7) = 0
-    DEG(3,40,8) = 0
-    DEG(3,40,9) = 0
-    DEG(3,40,10) = 0
-  COEF(3,40) = (0.1236694347662175, 0)
-    DEG(3,41,1) = 0
-    DEG(3,41,2) = 1
-    DEG(3,41,3) = 1
-    DEG(3,41,4) = 0
-    DEG(3,41,5) = 0
-    DEG(3,41,6) = 1
-    DEG(3,41,7) = 0
-    DEG(3,41,8) = 0
-    DEG(3,41,9) = 0
-    DEG(3,41,10) = 0
-  COEF(3,41) = (-0.033510271732486586, 0)
-    DEG(3,42,1) = 0
-    DEG(3,42,2) = 0
-    DEG(3,42,3) = 2
-    DEG(3,42,4) = 0
-    DEG(3,42,5) = 0
-    DEG(3,42,6) = 1
-    DEG(3,42,7) = 0
-    DEG(3,42,8) = 0
-    DEG(3,42,9) = 0
-    DEG(3,42,10) = 0
-  COEF(3,42) = (0.6625023868605743, 0)
-    DEG(3,43,1) = 2
-    DEG(3,43,2) = 0
-    DEG(3,43,3) = 0
-    DEG(3,43,4) = 1
-    DEG(3,43,5) = 0
-    DEG(3,43,6) = 1
-    DEG(3,43,7) = 0
-    DEG(3,43,8) = 0
-    DEG(3,43,9) = 0
-    DEG(3,43,10) = 0
-  COEF(3,43) = (-0.06941899872446193, 0)
-    DEG(3,44,1) = 1
-    DEG(3,44,2) = 1
-    DEG(3,44,3) = 0
-    DEG(3,44,4) = 1
-    DEG(3,44,5) = 0
-    DEG(3,44,6) = 1
-    DEG(3,44,7) = 0
-    DEG(3,44,8) = 0
-    DEG(3,44,9) = 0
-    DEG(3,44,10) = 0
-  COEF(3,44) = (-0.5612725019588681, 0)
-    DEG(3,45,1) = 0
-    DEG(3,45,2) = 2
-    DEG(3,45,3) = 0
-    DEG(3,45,4) = 1
-    DEG(3,45,5) = 0
-    DEG(3,45,6) = 1
-    DEG(3,45,7) = 0
-    DEG(3,45,8) = 0
-    DEG(3,45,9) = 0
-    DEG(3,45,10) = 0
-  COEF(3,45) = (1.4835363108262836, 0)
-    DEG(3,46,1) = 1
-    DEG(3,46,2) = 0
-    DEG(3,46,3) = 1
-    DEG(3,46,4) = 1
-    DEG(3,46,5) = 0
-    DEG(3,46,6) = 1
-    DEG(3,46,7) = 0
-    DEG(3,46,8) = 0
-    DEG(3,46,9) = 0
-    DEG(3,46,10) = 0
-  COEF(3,46) = (-0.8310204341509994, 0)
-    DEG(3,47,1) = 0
-    DEG(3,47,2) = 1
-    DEG(3,47,3) = 1
-    DEG(3,47,4) = 1
-    DEG(3,47,5) = 0
-    DEG(3,47,6) = 1
-    DEG(3,47,7) = 0
-    DEG(3,47,8) = 0
-    DEG(3,47,9) = 0
-    DEG(3,47,10) = 0
-  COEF(3,47) = (1.3650887611787323, 0)
-    DEG(3,48,1) = 0
-    DEG(3,48,2) = 0
-    DEG(3,48,3) = 2
-    DEG(3,48,4) = 1
-    DEG(3,48,5) = 0
-    DEG(3,48,6) = 1
-    DEG(3,48,7) = 0
-    DEG(3,48,8) = 0
-    DEG(3,48,9) = 0
-    DEG(3,48,10) = 0
-  COEF(3,48) = (-1.4141173121018216, 0)
-    DEG(3,49,1) = 2
-    DEG(3,49,2) = 0
-    DEG(3,49,3) = 0
-    DEG(3,49,4) = 0
-    DEG(3,49,5) = 1
-    DEG(3,49,6) = 1
-    DEG(3,49,7) = 0
-    DEG(3,49,8) = 0
-    DEG(3,49,9) = 0
-    DEG(3,49,10) = 0
-  COEF(3,49) = (-0.2915853970368523, 0)
-    DEG(3,50,1) = 1
-    DEG(3,50,2) = 1
-    DEG(3,50,3) = 0
-    DEG(3,50,4) = 0
-    DEG(3,50,5) = 1
-    DEG(3,50,6) = 1
-    DEG(3,50,7) = 0
-    DEG(3,50,8) = 0
-    DEG(3,50,9) = 0
-    DEG(3,50,10) = 0
-  COEF(3,50) = (-1.2521117933146961, 0)
-    DEG(3,51,1) = 0
-    DEG(3,51,2) = 2
-    DEG(3,51,3) = 0
-    DEG(3,51,4) = 0
-    DEG(3,51,5) = 1
-    DEG(3,51,6) = 1
-    DEG(3,51,7) = 0
-    DEG(3,51,8) = 0
-    DEG(3,51,9) = 0
-    DEG(3,51,10) = 0
-  COEF(3,51) = (0.38706376702247, 0)
-    DEG(3,52,1) = 1
-    DEG(3,52,2) = 0
-    DEG(3,52,3) = 1
-    DEG(3,52,4) = 0
-    DEG(3,52,5) = 1
-    DEG(3,52,6) = 1
-    DEG(3,52,7) = 0
-    DEG(3,52,8) = 0
-    DEG(3,52,9) = 0
-    DEG(3,52,10) = 0
-  COEF(3,52) = (1.2309129178715645, 0)
-    DEG(3,53,1) = 0
-    DEG(3,53,2) = 1
-    DEG(3,53,3) = 1
-    DEG(3,53,4) = 0
-    DEG(3,53,5) = 1
-    DEG(3,53,6) = 1
-    DEG(3,53,7) = 0
-    DEG(3,53,8) = 0
-    DEG(3,53,9) = 0
-    DEG(3,53,10) = 0
-  COEF(3,53) = (2.001338697637118, 0)
-    DEG(3,54,1) = 0
-    DEG(3,54,2) = 0
-    DEG(3,54,3) = 2
-    DEG(3,54,4) = 0
-    DEG(3,54,5) = 1
-    DEG(3,54,6) = 1
-    DEG(3,54,7) = 0
-    DEG(3,54,8) = 0
-    DEG(3,54,9) = 0
-    DEG(3,54,10) = 0
-  COEF(3,54) = (-0.09547836998561768, 0)
-    DEG(3,55,1) = 2
-    DEG(3,55,2) = 0
-    DEG(3,55,3) = 0
-    DEG(3,55,4) = 0
-    DEG(3,55,5) = 0
-    DEG(3,55,6) = 2
-    DEG(3,55,7) = 0
-    DEG(3,55,8) = 0
-    DEG(3,55,9) = 0
-    DEG(3,55,10) = 0
-  COEF(3,55) = (-0.14402870690714664, 0)
-    DEG(3,56,1) = 1
-    DEG(3,56,2) = 1
-    DEG(3,56,3) = 0
-    DEG(3,56,4) = 0
-    DEG(3,56,5) = 0
-    DEG(3,56,6) = 2
-    DEG(3,56,7) = 0
-    DEG(3,56,8) = 0
-    DEG(3,56,9) = 0
-    DEG(3,56,10) = 0
-  COEF(3,56) = (-0.2180983162506176, 0)
-    DEG(3,57,1) = 0
-    DEG(3,57,2) = 2
-    DEG(3,57,3) = 0
-    DEG(3,57,4) = 0
-    DEG(3,57,5) = 0
-    DEG(3,57,6) = 2
-    DEG(3,57,7) = 0
-    DEG(3,57,8) = 0
-    DEG(3,57,9) = 0
-    DEG(3,57,10) = 0
-  COEF(3,57) = (0.5479196153736324, 0)
-    DEG(3,58,1) = 1
-    DEG(3,58,2) = 0
-    DEG(3,58,3) = 1
-    DEG(3,58,4) = 0
-    DEG(3,58,5) = 0
-    DEG(3,58,6) = 2
-    DEG(3,58,7) = 0
-    DEG(3,58,8) = 0
-    DEG(3,58,9) = 0
-    DEG(3,58,10) = 0
-  COEF(3,58) = (1.1350235517082958, 0)
-    DEG(3,59,1) = 0
-    DEG(3,59,2) = 1
-    DEG(3,59,3) = 1
-    DEG(3,59,4) = 0
-    DEG(3,59,5) = 0
-    DEG(3,59,6) = 2
-    DEG(3,59,7) = 0
-    DEG(3,59,8) = 0
-    DEG(3,59,9) = 0
-    DEG(3,59,10) = 0
-  COEF(3,59) = (-1.2902482267743214, 0)
-    DEG(3,60,1) = 0
-    DEG(3,60,2) = 0
-    DEG(3,60,3) = 2
-    DEG(3,60,4) = 0
-    DEG(3,60,5) = 0
-    DEG(3,60,6) = 2
-    DEG(3,60,7) = 0
-    DEG(3,60,8) = 0
-    DEG(3,60,9) = 0
-    DEG(3,60,10) = 0
-  COEF(3,60) = (-0.40389090846648584, 0)
-    DEG(3,61,1) = 0
-    DEG(3,61,2) = 0
-    DEG(3,61,3) = 0
-    DEG(3,61,4) = 0
-    DEG(3,61,5) = 0
-    DEG(3,61,6) = 0
-    DEG(3,61,7) = 1
-    DEG(3,61,8) = 0
-    DEG(3,61,9) = 0
-    DEG(3,61,10) = 0
-  COEF(3,61) = (-0.31676197137727014, 0)
-    DEG(3,62,1) = 0
-    DEG(3,62,2) = 0
-    DEG(3,62,3) = 0
-    DEG(3,62,4) = 1
-    DEG(3,62,5) = 0
-    DEG(3,62,6) = 0
-    DEG(3,62,7) = 1
-    DEG(3,62,8) = 0
-    DEG(3,62,9) = 0
-    DEG(3,62,10) = 0
-  COEF(3,62) = (0.44977644852595483, 0)
-    DEG(3,63,1) = 0
-    DEG(3,63,2) = 0
-    DEG(3,63,3) = 0
-    DEG(3,63,4) = 0
-    DEG(3,63,5) = 1
-    DEG(3,63,6) = 0
-    DEG(3,63,7) = 1
-    DEG(3,63,8) = 0
-    DEG(3,63,9) = 0
-    DEG(3,63,10) = 0
-  COEF(3,63) = (-0.06472442427348668, 0)
-    DEG(3,64,1) = 0
-    DEG(3,64,2) = 0
-    DEG(3,64,3) = 0
-    DEG(3,64,4) = 0
-    DEG(3,64,5) = 0
-    DEG(3,64,6) = 1
-    DEG(3,64,7) = 1
-    DEG(3,64,8) = 0
-    DEG(3,64,9) = 0
-    DEG(3,64,10) = 0
-  COEF(3,64) = (-2.2439307772054415, 0)
-    DEG(3,65,1) = 0
-    DEG(3,65,2) = 0
-    DEG(3,65,3) = 0
-    DEG(3,65,4) = 0
-    DEG(3,65,5) = 0
-    DEG(3,65,6) = 0
-    DEG(3,65,7) = 0
-    DEG(3,65,8) = 1
-    DEG(3,65,9) = 0
-    DEG(3,65,10) = 0
-  COEF(3,65) = (-0.5547165223690258, 0)
-    DEG(3,66,1) = 0
-    DEG(3,66,2) = 0
-    DEG(3,66,3) = 0
-    DEG(3,66,4) = 1
-    DEG(3,66,5) = 0
-    DEG(3,66,6) = 0
-    DEG(3,66,7) = 0
-    DEG(3,66,8) = 1
-    DEG(3,66,9) = 0
-    DEG(3,66,10) = 0
-  COEF(3,66) = (0.23831878651082344, 0)
-    DEG(3,67,1) = 0
-    DEG(3,67,2) = 0
-    DEG(3,67,3) = 0
-    DEG(3,67,4) = 0
-    DEG(3,67,5) = 1
-    DEG(3,67,6) = 0
-    DEG(3,67,7) = 0
-    DEG(3,67,8) = 1
-    DEG(3,67,9) = 0
-    DEG(3,67,10) = 0
-  COEF(3,67) = (0.031977776730485255, 0)
-    DEG(3,68,1) = 0
-    DEG(3,68,2) = 0
-    DEG(3,68,3) = 0
-    DEG(3,68,4) = 0
-    DEG(3,68,5) = 0
-    DEG(3,68,6) = 1
-    DEG(3,68,7) = 0
-    DEG(3,68,8) = 1
-    DEG(3,68,9) = 0
-    DEG(3,68,10) = 0
-  COEF(3,68) = (0.16687455406564522, 0)
-    DEG(3,69,1) = 0
-    DEG(3,69,2) = 0
-    DEG(3,69,3) = 0
-    DEG(3,69,4) = 0
-    DEG(3,69,5) = 0
-    DEG(3,69,6) = 0
-    DEG(3,69,7) = 0
-    DEG(3,69,8) = 0
-    DEG(3,69,9) = 1
-    DEG(3,69,10) = 0
-  COEF(3,69) = (0.9423377906275198, 0)
-    DEG(3,70,1) = 0
-    DEG(3,70,2) = 0
-    DEG(3,70,3) = 0
-    DEG(3,70,4) = 1
-    DEG(3,70,5) = 0
-    DEG(3,70,6) = 0
-    DEG(3,70,7) = 0
-    DEG(3,70,8) = 0
-    DEG(3,70,9) = 1
-    DEG(3,70,10) = 0
-  COEF(3,70) = (1.376589178886685, 0)
-    DEG(3,71,1) = 0
-    DEG(3,71,2) = 0
-    DEG(3,71,3) = 0
-    DEG(3,71,4) = 0
-    DEG(3,71,5) = 1
-    DEG(3,71,6) = 0
-    DEG(3,71,7) = 0
-    DEG(3,71,8) = 0
-    DEG(3,71,9) = 1
-    DEG(3,71,10) = 0
-  COEF(3,71) = (0.5306523901876015, 0)
-    DEG(3,72,1) = 0
-    DEG(3,72,2) = 0
-    DEG(3,72,3) = 0
-    DEG(3,72,4) = 0
-    DEG(3,72,5) = 0
-    DEG(3,72,6) = 1
-    DEG(3,72,7) = 0
-    DEG(3,72,8) = 0
-    DEG(3,72,9) = 1
-    DEG(3,72,10) = 0
-  COEF(3,72) = (0.4754891181933043, 0)
-    DEG(3,73,1) = 0
-    DEG(3,73,2) = 0
-    DEG(3,73,3) = 0
-    DEG(3,73,4) = 0
-    DEG(3,73,5) = 0
-    DEG(3,73,6) = 0
-    DEG(3,73,7) = 0
-    DEG(3,73,8) = 0
-    DEG(3,73,9) = 0
-    DEG(3,73,10) = 1
-  COEF(3,73) = (0.09673230093655334, 0)
-    DEG(3,74,1) = 0
-    DEG(3,74,2) = 0
-    DEG(3,74,3) = 0
-    DEG(3,74,4) = 1
-    DEG(3,74,5) = 0
-    DEG(3,74,6) = 0
-    DEG(3,74,7) = 0
-    DEG(3,74,8) = 0
-    DEG(3,74,9) = 0
-    DEG(3,74,10) = 1
-  COEF(3,74) = (0.0892904130224598, 0)
-    DEG(3,75,1) = 0
-    DEG(3,75,2) = 0
-    DEG(3,75,3) = 0
-    DEG(3,75,4) = 0
-    DEG(3,75,5) = 1
-    DEG(3,75,6) = 0
-    DEG(3,75,7) = 0
-    DEG(3,75,8) = 0
-    DEG(3,75,9) = 0
-    DEG(3,75,10) = 1
-  COEF(3,75) = (0.943551163213123, 0)
-    DEG(3,76,1) = 0
-    DEG(3,76,2) = 0
-    DEG(3,76,3) = 0
-    DEG(3,76,4) = 0
-    DEG(3,76,5) = 0
-    DEG(3,76,6) = 1
-    DEG(3,76,7) = 0
-    DEG(3,76,8) = 0
-    DEG(3,76,9) = 0
-    DEG(3,76,10) = 1
-  COEF(3,76) = (-1.2527250130712726, 0)
-
-NUM_TERMS(4) = 76
-    DEG(4,1,1) = 2
-    DEG(4,1,2) = 0
-    DEG(4,1,3) = 0
-    DEG(4,1,4) = 0
-    DEG(4,1,5) = 0
-    DEG(4,1,6) = 0
-    DEG(4,1,7) = 0
-    DEG(4,1,8) = 0
-    DEG(4,1,9) = 0
-    DEG(4,1,10) = 0
-  COEF(4,1) = (-0.04095049824628835, 0)
-    DEG(4,2,1) = 1
-    DEG(4,2,2) = 1
-    DEG(4,2,3) = 0
-    DEG(4,2,4) = 0
-    DEG(4,2,5) = 0
-    DEG(4,2,6) = 0
-    DEG(4,2,7) = 0
-    DEG(4,2,8) = 0
-    DEG(4,2,9) = 0
-    DEG(4,2,10) = 0
-  COEF(4,2) = (0.043116025511842154, 0)
-    DEG(4,3,1) = 0
-    DEG(4,3,2) = 2
-    DEG(4,3,3) = 0
-    DEG(4,3,4) = 0
-    DEG(4,3,5) = 0
-    DEG(4,3,6) = 0
-    DEG(4,3,7) = 0
-    DEG(4,3,8) = 0
-    DEG(4,3,9) = 0
-    DEG(4,3,10) = 0
-  COEF(4,3) = (0.003940499198786224, 0)
-    DEG(4,4,1) = 1
-    DEG(4,4,2) = 0
-    DEG(4,4,3) = 1
-    DEG(4,4,4) = 0
-    DEG(4,4,5) = 0
-    DEG(4,4,6) = 0
-    DEG(4,4,7) = 0
-    DEG(4,4,8) = 0
-    DEG(4,4,9) = 0
-    DEG(4,4,10) = 0
-  COEF(4,4) = (0.7629770334036455, 0)
-    DEG(4,5,1) = 0
-    DEG(4,5,2) = 1
-    DEG(4,5,3) = 1
-    DEG(4,5,4) = 0
-    DEG(4,5,5) = 0
-    DEG(4,5,6) = 0
-    DEG(4,5,7) = 0
-    DEG(4,5,8) = 0
-    DEG(4,5,9) = 0
-    DEG(4,5,10) = 0
-  COEF(4,5) = (-0.8492350760146794, 0)
-    DEG(4,6,1) = 0
-    DEG(4,6,2) = 0
-    DEG(4,6,3) = 2
-    DEG(4,6,4) = 0
-    DEG(4,6,5) = 0
-    DEG(4,6,6) = 0
-    DEG(4,6,7) = 0
-    DEG(4,6,8) = 0
-    DEG(4,6,9) = 0
-    DEG(4,6,10) = 0
-  COEF(4,6) = (-0.2784174783424625, 0)
-    DEG(4,7,1) = 2
-    DEG(4,7,2) = 0
-    DEG(4,7,3) = 0
-    DEG(4,7,4) = 1
-    DEG(4,7,5) = 0
-    DEG(4,7,6) = 0
-    DEG(4,7,7) = 0
-    DEG(4,7,8) = 0
-    DEG(4,7,9) = 0
-    DEG(4,7,10) = 0
-  COEF(4,7) = (0.4281444292173086, 0)
-    DEG(4,8,1) = 1
-    DEG(4,8,2) = 1
-    DEG(4,8,3) = 0
-    DEG(4,8,4) = 1
-    DEG(4,8,5) = 0
-    DEG(4,8,6) = 0
-    DEG(4,8,7) = 0
-    DEG(4,8,8) = 0
-    DEG(4,8,9) = 0
-    DEG(4,8,10) = 0
-  COEF(4,8) = (-0.8828960936117035, 0)
-    DEG(4,9,1) = 0
-    DEG(4,9,2) = 2
-    DEG(4,9,3) = 0
-    DEG(4,9,4) = 1
-    DEG(4,9,5) = 0
-    DEG(4,9,6) = 0
-    DEG(4,9,7) = 0
-    DEG(4,9,8) = 0
-    DEG(4,9,9) = 0
-    DEG(4,9,10) = 0
-  COEF(4,9) = (0.5676682886279524, 0)
-    DEG(4,10,1) = 1
-    DEG(4,10,2) = 0
-    DEG(4,10,3) = 1
-    DEG(4,10,4) = 1
-    DEG(4,10,5) = 0
-    DEG(4,10,6) = 0
-    DEG(4,10,7) = 0
-    DEG(4,10,8) = 0
-    DEG(4,10,9) = 0
-    DEG(4,10,10) = 0
-  COEF(4,10) = (-1.3924527881029736, 0)
-    DEG(4,11,1) = 0
-    DEG(4,11,2) = 1
-    DEG(4,11,3) = 1
-    DEG(4,11,4) = 1
-    DEG(4,11,5) = 0
-    DEG(4,11,6) = 0
-    DEG(4,11,7) = 0
-    DEG(4,11,8) = 0
-    DEG(4,11,9) = 0
-    DEG(4,11,10) = 0
-  COEF(4,11) = (-0.08671339002537767, 0)
-    DEG(4,12,1) = 0
-    DEG(4,12,2) = 0
-    DEG(4,12,3) = 2
-    DEG(4,12,4) = 1
-    DEG(4,12,5) = 0
-    DEG(4,12,6) = 0
-    DEG(4,12,7) = 0
-    DEG(4,12,8) = 0
-    DEG(4,12,9) = 0
-    DEG(4,12,10) = 0
-  COEF(4,12) = (-0.7256104095984146, 0)
-    DEG(4,13,1) = 2
-    DEG(4,13,2) = 0
-    DEG(4,13,3) = 0
-    DEG(4,13,4) = 2
-    DEG(4,13,5) = 0
-    DEG(4,13,6) = 0
-    DEG(4,13,7) = 0
-    DEG(4,13,8) = 0
-    DEG(4,13,9) = 0
-    DEG(4,13,10) = 0
-  COEF(4,13) = (-0.5422313181564682, 0)
-    DEG(4,14,1) = 1
-    DEG(4,14,2) = 1
-    DEG(4,14,3) = 0
-    DEG(4,14,4) = 2
-    DEG(4,14,5) = 0
-    DEG(4,14,6) = 0
-    DEG(4,14,7) = 0
-    DEG(4,14,8) = 0
-    DEG(4,14,9) = 0
-    DEG(4,14,10) = 0
-  COEF(4,14) = (0.4871946471731439, 0)
-    DEG(4,15,1) = 0
-    DEG(4,15,2) = 2
-    DEG(4,15,3) = 0
-    DEG(4,15,4) = 2
-    DEG(4,15,5) = 0
-    DEG(4,15,6) = 0
-    DEG(4,15,7) = 0
-    DEG(4,15,8) = 0
-    DEG(4,15,9) = 0
-    DEG(4,15,10) = 0
-  COEF(4,15) = (0.33193585698170985, 0)
-    DEG(4,16,1) = 1
-    DEG(4,16,2) = 0
-    DEG(4,16,3) = 1
-    DEG(4,16,4) = 2
-    DEG(4,16,5) = 0
-    DEG(4,16,6) = 0
-    DEG(4,16,7) = 0
-    DEG(4,16,8) = 0
-    DEG(4,16,9) = 0
-    DEG(4,16,10) = 0
-  COEF(4,16) = (-0.10273772900088107, 0)
-    DEG(4,17,1) = 0
-    DEG(4,17,2) = 1
-    DEG(4,17,3) = 1
-    DEG(4,17,4) = 2
-    DEG(4,17,5) = 0
-    DEG(4,17,6) = 0
-    DEG(4,17,7) = 0
-    DEG(4,17,8) = 0
-    DEG(4,17,9) = 0
-    DEG(4,17,10) = 0
-  COEF(4,17) = (0.6624874115365778, 0)
-    DEG(4,18,1) = 0
-    DEG(4,18,2) = 0
-    DEG(4,18,3) = 2
-    DEG(4,18,4) = 2
-    DEG(4,18,5) = 0
-    DEG(4,18,6) = 0
-    DEG(4,18,7) = 0
-    DEG(4,18,8) = 0
-    DEG(4,18,9) = 0
-    DEG(4,18,10) = 0
-  COEF(4,18) = (0.21029546117475836, 0)
-    DEG(4,19,1) = 2
-    DEG(4,19,2) = 0
-    DEG(4,19,3) = 0
-    DEG(4,19,4) = 0
-    DEG(4,19,5) = 1
-    DEG(4,19,6) = 0
-    DEG(4,19,7) = 0
-    DEG(4,19,8) = 0
-    DEG(4,19,9) = 0
-    DEG(4,19,10) = 0
-  COEF(4,19) = (1.1356911567255628, 0)
-    DEG(4,20,1) = 1
-    DEG(4,20,2) = 1
-    DEG(4,20,3) = 0
-    DEG(4,20,4) = 0
-    DEG(4,20,5) = 1
-    DEG(4,20,6) = 0
-    DEG(4,20,7) = 0
-    DEG(4,20,8) = 0
-    DEG(4,20,9) = 0
-    DEG(4,20,10) = 0
-  COEF(4,20) = (-1.222100685178249, 0)
-    DEG(4,21,1) = 0
-    DEG(4,21,2) = 2
-    DEG(4,21,3) = 0
-    DEG(4,21,4) = 0
-    DEG(4,21,5) = 1
-    DEG(4,21,6) = 0
-    DEG(4,21,7) = 0
-    DEG(4,21,8) = 0
-    DEG(4,21,9) = 0
-    DEG(4,21,10) = 0
-  COEF(4,21) = (-0.09334002143332033, 0)
-    DEG(4,22,1) = 1
-    DEG(4,22,2) = 0
-    DEG(4,22,3) = 1
-    DEG(4,22,4) = 0
-    DEG(4,22,5) = 1
-    DEG(4,22,6) = 0
-    DEG(4,22,7) = 0
-    DEG(4,22,8) = 0
-    DEG(4,22,9) = 0
-    DEG(4,22,10) = 0
-  COEF(4,22) = (-1.6524959396527132, 0)
-    DEG(4,23,1) = 0
-    DEG(4,23,2) = 1
-    DEG(4,23,3) = 1
-    DEG(4,23,4) = 0
-    DEG(4,23,5) = 1
-    DEG(4,23,6) = 0
-    DEG(4,23,7) = 0
-    DEG(4,23,8) = 0
-    DEG(4,23,9) = 0
-    DEG(4,23,10) = 0
-  COEF(4,23) = (1.5569725124184146, 0)
-    DEG(4,24,1) = 0
-    DEG(4,24,2) = 0
-    DEG(4,24,3) = 2
-    DEG(4,24,4) = 0
-    DEG(4,24,5) = 1
-    DEG(4,24,6) = 0
-    DEG(4,24,7) = 0
-    DEG(4,24,8) = 0
-    DEG(4,24,9) = 0
-    DEG(4,24,10) = 0
-  COEF(4,24) = (0.7669386068453008, 0)
-    DEG(4,25,1) = 2
-    DEG(4,25,2) = 0
-    DEG(4,25,3) = 0
-    DEG(4,25,4) = 1
-    DEG(4,25,5) = 1
-    DEG(4,25,6) = 0
-    DEG(4,25,7) = 0
-    DEG(4,25,8) = 0
-    DEG(4,25,9) = 0
-    DEG(4,25,10) = 0
-  COEF(4,25) = (-1.5587675264538823, 0)
-    DEG(4,26,1) = 1
-    DEG(4,26,2) = 1
-    DEG(4,26,3) = 0
-    DEG(4,26,4) = 1
-    DEG(4,26,5) = 1
-    DEG(4,26,6) = 0
-    DEG(4,26,7) = 0
-    DEG(4,26,8) = 0
-    DEG(4,26,9) = 0
-    DEG(4,26,10) = 0
-  COEF(4,26) = (-1.1317581527003464, 0)
-    DEG(4,27,1) = 0
-    DEG(4,27,2) = 2
-    DEG(4,27,3) = 0
-    DEG(4,27,4) = 1
-    DEG(4,27,5) = 1
-    DEG(4,27,6) = 0
-    DEG(4,27,7) = 0
-    DEG(4,27,8) = 0
-    DEG(4,27,9) = 0
-    DEG(4,27,10) = 0
-  COEF(4,27) = (0.01829080736739283, 0)
-    DEG(4,28,1) = 1
-    DEG(4,28,2) = 0
-    DEG(4,28,3) = 1
-    DEG(4,28,4) = 1
-    DEG(4,28,5) = 1
-    DEG(4,28,6) = 0
-    DEG(4,28,7) = 0
-    DEG(4,28,8) = 0
-    DEG(4,28,9) = 0
-    DEG(4,28,10) = 0
-  COEF(4,28) = (1.0020439814840232, 0)
-    DEG(4,29,1) = 0
-    DEG(4,29,2) = 1
-    DEG(4,29,3) = 1
-    DEG(4,29,4) = 1
-    DEG(4,29,5) = 1
-    DEG(4,29,6) = 0
-    DEG(4,29,7) = 0
-    DEG(4,29,8) = 0
-    DEG(4,29,9) = 0
-    DEG(4,29,10) = 0
-  COEF(4,29) = (0.7984049760283556, 0)
-    DEG(4,30,1) = 0
-    DEG(4,30,2) = 0
-    DEG(4,30,3) = 2
-    DEG(4,30,4) = 1
-    DEG(4,30,5) = 1
-    DEG(4,30,6) = 0
-    DEG(4,30,7) = 0
-    DEG(4,30,8) = 0
-    DEG(4,30,9) = 0
-    DEG(4,30,10) = 0
-  COEF(4,30) = (1.5404767190864894, 0)
-    DEG(4,31,1) = 2
-    DEG(4,31,2) = 0
-    DEG(4,31,3) = 0
-    DEG(4,31,4) = 0
-    DEG(4,31,5) = 2
-    DEG(4,31,6) = 0
-    DEG(4,31,7) = 0
-    DEG(4,31,8) = 0
-    DEG(4,31,9) = 0
-    DEG(4,31,10) = 0
-  COEF(4,31) = (0.4331904808414006, 0)
-    DEG(4,32,1) = 1
-    DEG(4,32,2) = 1
-    DEG(4,32,3) = 0
-    DEG(4,32,4) = 0
-    DEG(4,32,5) = 2
-    DEG(4,32,6) = 0
-    DEG(4,32,7) = 0
-    DEG(4,32,8) = 0
-    DEG(4,32,9) = 0
-    DEG(4,32,10) = 0
-  COEF(4,32) = (-0.1389285705830233, 0)
-    DEG(4,33,1) = 0
-    DEG(4,33,2) = 2
-    DEG(4,33,3) = 0
-    DEG(4,33,4) = 0
-    DEG(4,33,5) = 2
-    DEG(4,33,6) = 0
-    DEG(4,33,7) = 0
-    DEG(4,33,8) = 0
-    DEG(4,33,9) = 0
-    DEG(4,33,10) = 0
-  COEF(4,33) = (-0.012183710127155694, 0)
-    DEG(4,34,1) = 1
-    DEG(4,34,2) = 0
-    DEG(4,34,3) = 1
-    DEG(4,34,4) = 0
-    DEG(4,34,5) = 2
-    DEG(4,34,6) = 0
-    DEG(4,34,7) = 0
-    DEG(4,34,8) = 0
-    DEG(4,34,9) = 0
-    DEG(4,34,10) = 0
-  COEF(4,34) = (-0.23769385136664706, 0)
-    DEG(4,35,1) = 0
-    DEG(4,35,2) = 1
-    DEG(4,35,3) = 1
-    DEG(4,35,4) = 0
-    DEG(4,35,5) = 2
-    DEG(4,35,6) = 0
-    DEG(4,35,7) = 0
-    DEG(4,35,8) = 0
-    DEG(4,35,9) = 0
-    DEG(4,35,10) = 0
-  COEF(4,35) = (0.24382837068218804, 0)
-    DEG(4,36,1) = 0
-    DEG(4,36,2) = 0
-    DEG(4,36,3) = 2
-    DEG(4,36,4) = 0
-    DEG(4,36,5) = 2
-    DEG(4,36,6) = 0
-    DEG(4,36,7) = 0
-    DEG(4,36,8) = 0
-    DEG(4,36,9) = 0
-    DEG(4,36,10) = 0
-  COEF(4,36) = (-0.4210067707142449, 0)
-    DEG(4,37,1) = 2
-    DEG(4,37,2) = 0
-    DEG(4,37,3) = 0
-    DEG(4,37,4) = 0
-    DEG(4,37,5) = 0
-    DEG(4,37,6) = 1
-    DEG(4,37,7) = 0
-    DEG(4,37,8) = 0
-    DEG(4,37,9) = 0
-    DEG(4,37,10) = 0
-  COEF(4,37) = (0.21198555697618326, 0)
-    DEG(4,38,1) = 1
-    DEG(4,38,2) = 1
-    DEG(4,38,3) = 0
-    DEG(4,38,4) = 0
-    DEG(4,38,5) = 0
-    DEG(4,38,6) = 1
-    DEG(4,38,7) = 0
-    DEG(4,38,8) = 0
-    DEG(4,38,9) = 0
-    DEG(4,38,10) = 0
-  COEF(4,38) = (-0.01647709154129892, 0)
-    DEG(4,39,1) = 0
-    DEG(4,39,2) = 2
-    DEG(4,39,3) = 0
-    DEG(4,39,4) = 0
-    DEG(4,39,5) = 0
-    DEG(4,39,6) = 1
-    DEG(4,39,7) = 0
-    DEG(4,39,8) = 0
-    DEG(4,39,9) = 0
-    DEG(4,39,10) = 0
-  COEF(4,39) = (-0.18945218115272705, 0)
-    DEG(4,40,1) = 1
-    DEG(4,40,2) = 0
-    DEG(4,40,3) = 1
-    DEG(4,40,4) = 0
-    DEG(4,40,5) = 0
-    DEG(4,40,6) = 1
-    DEG(4,40,7) = 0
-    DEG(4,40,8) = 0
-    DEG(4,40,9) = 0
-    DEG(4,40,10) = 0
-  COEF(4,40) = (0.77528301920843, 0)
-    DEG(4,41,1) = 0
-    DEG(4,41,2) = 1
-    DEG(4,41,3) = 1
-    DEG(4,41,4) = 0
-    DEG(4,41,5) = 0
-    DEG(4,41,6) = 1
-    DEG(4,41,7) = 0
-    DEG(4,41,8) = 0
-    DEG(4,41,9) = 0
-    DEG(4,41,10) = 0
-  COEF(4,41) = (-2.0514046696465, 0)
-    DEG(4,42,1) = 0
-    DEG(4,42,2) = 0
-    DEG(4,42,3) = 2
-    DEG(4,42,4) = 0
-    DEG(4,42,5) = 0
-    DEG(4,42,6) = 1
-    DEG(4,42,7) = 0
-    DEG(4,42,8) = 0
-    DEG(4,42,9) = 0
-    DEG(4,42,10) = 0
-  COEF(4,42) = (0.10432028494512646, 0)
-    DEG(4,43,1) = 2
-    DEG(4,43,2) = 0
-    DEG(4,43,3) = 0
-    DEG(4,43,4) = 1
-    DEG(4,43,5) = 0
-    DEG(4,43,6) = 1
-    DEG(4,43,7) = 0
-    DEG(4,43,8) = 0
-    DEG(4,43,9) = 0
-    DEG(4,43,10) = 0
-  COEF(4,43) = (-0.1676311045685404, 0)
-    DEG(4,44,1) = 1
-    DEG(4,44,2) = 1
-    DEG(4,44,3) = 0
-    DEG(4,44,4) = 1
-    DEG(4,44,5) = 0
-    DEG(4,44,6) = 1
-    DEG(4,44,7) = 0
-    DEG(4,44,8) = 0
-    DEG(4,44,9) = 0
-    DEG(4,44,10) = 0
-  COEF(4,44) = (-1.325546381572095, 0)
-    DEG(4,45,1) = 0
-    DEG(4,45,2) = 2
-    DEG(4,45,3) = 0
-    DEG(4,45,4) = 1
-    DEG(4,45,5) = 0
-    DEG(4,45,6) = 1
-    DEG(4,45,7) = 0
-    DEG(4,45,8) = 0
-    DEG(4,45,9) = 0
-    DEG(4,45,10) = 0
-  COEF(4,45) = (0.8078478514339609, 0)
-    DEG(4,46,1) = 1
-    DEG(4,46,2) = 0
-    DEG(4,46,3) = 1
-    DEG(4,46,4) = 1
-    DEG(4,46,5) = 0
-    DEG(4,46,6) = 1
-    DEG(4,46,7) = 0
-    DEG(4,46,8) = 0
-    DEG(4,46,9) = 0
-    DEG(4,46,10) = 0
-  COEF(4,46) = (-0.9669176278885212, 0)
-    DEG(4,47,1) = 0
-    DEG(4,47,2) = 1
-    DEG(4,47,3) = 1
-    DEG(4,47,4) = 1
-    DEG(4,47,5) = 0
-    DEG(4,47,6) = 1
-    DEG(4,47,7) = 0
-    DEG(4,47,8) = 0
-    DEG(4,47,9) = 0
-    DEG(4,47,10) = 0
-  COEF(4,47) = (-0.36872926793739896, 0)
-    DEG(4,48,1) = 0
-    DEG(4,48,2) = 0
-    DEG(4,48,3) = 2
-    DEG(4,48,4) = 1
-    DEG(4,48,5) = 0
-    DEG(4,48,6) = 1
-    DEG(4,48,7) = 0
-    DEG(4,48,8) = 0
-    DEG(4,48,9) = 0
-    DEG(4,48,10) = 0
-  COEF(4,48) = (-0.6402167468654205, 0)
-    DEG(4,49,1) = 2
-    DEG(4,49,2) = 0
-    DEG(4,49,3) = 0
-    DEG(4,49,4) = 0
-    DEG(4,49,5) = 1
-    DEG(4,49,6) = 1
-    DEG(4,49,7) = 0
-    DEG(4,49,8) = 0
-    DEG(4,49,9) = 0
-    DEG(4,49,10) = 0
-  COEF(4,49) = (0.6297207100844667, 0)
-    DEG(4,50,1) = 1
-    DEG(4,50,2) = 1
-    DEG(4,50,3) = 0
-    DEG(4,50,4) = 0
-    DEG(4,50,5) = 1
-    DEG(4,50,6) = 1
-    DEG(4,50,7) = 0
-    DEG(4,50,8) = 0
-    DEG(4,50,9) = 0
-    DEG(4,50,10) = 0
-  COEF(4,50) = (-2.067771321161895, 0)
-    DEG(4,51,1) = 0
-    DEG(4,51,2) = 2
-    DEG(4,51,3) = 0
-    DEG(4,51,4) = 0
-    DEG(4,51,5) = 1
-    DEG(4,51,6) = 1
-    DEG(4,51,7) = 0
-    DEG(4,51,8) = 0
-    DEG(4,51,9) = 0
-    DEG(4,51,10) = 0
-  COEF(4,51) = (-0.17862819697751522, 0)
-    DEG(4,52,1) = 1
-    DEG(4,52,2) = 0
-    DEG(4,52,3) = 1
-    DEG(4,52,4) = 0
-    DEG(4,52,5) = 1
-    DEG(4,52,6) = 1
-    DEG(4,52,7) = 0
-    DEG(4,52,8) = 0
-    DEG(4,52,9) = 0
-    DEG(4,52,10) = 0
-  COEF(4,52) = (0.020391323549034297, 0)
-    DEG(4,53,1) = 0
-    DEG(4,53,2) = 1
-    DEG(4,53,3) = 1
-    DEG(4,53,4) = 0
-    DEG(4,53,5) = 1
-    DEG(4,53,6) = 1
-    DEG(4,53,7) = 0
-    DEG(4,53,8) = 0
-    DEG(4,53,9) = 0
-    DEG(4,53,10) = 0
-  COEF(4,53) = (2.777563669744398, 0)
-    DEG(4,54,1) = 0
-    DEG(4,54,2) = 0
-    DEG(4,54,3) = 2
-    DEG(4,54,4) = 0
-    DEG(4,54,5) = 1
-    DEG(4,54,6) = 1
-    DEG(4,54,7) = 0
-    DEG(4,54,8) = 0
-    DEG(4,54,9) = 0
-    DEG(4,54,10) = 0
-  COEF(4,54) = (-0.45109251310695153, 0)
-    DEG(4,55,1) = 2
-    DEG(4,55,2) = 0
-    DEG(4,55,3) = 0
-    DEG(4,55,4) = 0
-    DEG(4,55,5) = 0
-    DEG(4,55,6) = 2
-    DEG(4,55,7) = 0
-    DEG(4,55,8) = 0
-    DEG(4,55,9) = 0
-    DEG(4,55,10) = 0
-  COEF(4,55) = (0.10904083731506761, 0)
-    DEG(4,56,1) = 1
-    DEG(4,56,2) = 1
-    DEG(4,56,3) = 0
-    DEG(4,56,4) = 0
-    DEG(4,56,5) = 0
-    DEG(4,56,6) = 2
-    DEG(4,56,7) = 0
-    DEG(4,56,8) = 0
-    DEG(4,56,9) = 0
-    DEG(4,56,10) = 0
-  COEF(4,56) = (-0.3482660765901206, 0)
-    DEG(4,57,1) = 0
-    DEG(4,57,2) = 2
-    DEG(4,57,3) = 0
-    DEG(4,57,4) = 0
-    DEG(4,57,5) = 0
-    DEG(4,57,6) = 2
-    DEG(4,57,7) = 0
-    DEG(4,57,8) = 0
-    DEG(4,57,9) = 0
-    DEG(4,57,10) = 0
-  COEF(4,57) = (-0.31975214685455416, 0)
-    DEG(4,58,1) = 1
-    DEG(4,58,2) = 0
-    DEG(4,58,3) = 1
-    DEG(4,58,4) = 0
-    DEG(4,58,5) = 0
-    DEG(4,58,6) = 2
-    DEG(4,58,7) = 0
-    DEG(4,58,8) = 0
-    DEG(4,58,9) = 0
-    DEG(4,58,10) = 0
-  COEF(4,58) = (0.34043158036752813, 0)
-    DEG(4,59,1) = 0
-    DEG(4,59,2) = 1
-    DEG(4,59,3) = 1
-    DEG(4,59,4) = 0
-    DEG(4,59,5) = 0
-    DEG(4,59,6) = 2
-    DEG(4,59,7) = 0
-    DEG(4,59,8) = 0
-    DEG(4,59,9) = 0
-    DEG(4,59,10) = 0
-  COEF(4,59) = (-0.9063157822187657, 0)
-    DEG(4,60,1) = 0
-    DEG(4,60,2) = 0
-    DEG(4,60,3) = 2
-    DEG(4,60,4) = 0
-    DEG(4,60,5) = 0
-    DEG(4,60,6) = 2
-    DEG(4,60,7) = 0
-    DEG(4,60,8) = 0
-    DEG(4,60,9) = 0
-    DEG(4,60,10) = 0
-  COEF(4,60) = (0.21071130953948652, 0)
-    DEG(4,61,1) = 0
-    DEG(4,61,2) = 0
-    DEG(4,61,3) = 0
-    DEG(4,61,4) = 0
-    DEG(4,61,5) = 0
-    DEG(4,61,6) = 0
-    DEG(4,61,7) = 1
-    DEG(4,61,8) = 0
-    DEG(4,61,9) = 0
-    DEG(4,61,10) = 0
-  COEF(4,61) = (0.31542747738996463, 0)
-    DEG(4,62,1) = 0
-    DEG(4,62,2) = 0
-    DEG(4,62,3) = 0
-    DEG(4,62,4) = 1
-    DEG(4,62,5) = 0
-    DEG(4,62,6) = 0
-    DEG(4,62,7) = 1
-    DEG(4,62,8) = 0
-    DEG(4,62,9) = 0
-    DEG(4,62,10) = 0
-  COEF(4,62) = (-0.27020230824684643, 0)
-    DEG(4,63,1) = 0
-    DEG(4,63,2) = 0
-    DEG(4,63,3) = 0
-    DEG(4,63,4) = 0
-    DEG(4,63,5) = 1
-    DEG(4,63,6) = 0
-    DEG(4,63,7) = 1
-    DEG(4,63,8) = 0
-    DEG(4,63,9) = 0
-    DEG(4,63,10) = 0
-  COEF(4,63) = (-1.8092897421375431, 0)
-    DEG(4,64,1) = 0
-    DEG(4,64,2) = 0
-    DEG(4,64,3) = 0
-    DEG(4,64,4) = 0
-    DEG(4,64,5) = 0
-    DEG(4,64,6) = 1
-    DEG(4,64,7) = 1
-    DEG(4,64,8) = 0
-    DEG(4,64,9) = 0
-    DEG(4,64,10) = 0
-  COEF(4,64) = (-0.12685366076858268, 0)
-    DEG(4,65,1) = 0
-    DEG(4,65,2) = 0
-    DEG(4,65,3) = 0
-    DEG(4,65,4) = 0
-    DEG(4,65,5) = 0
-    DEG(4,65,6) = 0
-    DEG(4,65,7) = 0
-    DEG(4,65,8) = 1
-    DEG(4,65,9) = 0
-    DEG(4,65,10) = 0
-  COEF(4,65) = (-0.9721054060313574, 0)
-    DEG(4,66,1) = 0
-    DEG(4,66,2) = 0
-    DEG(4,66,3) = 0
-    DEG(4,66,4) = 1
-    DEG(4,66,5) = 0
-    DEG(4,66,6) = 0
-    DEG(4,66,7) = 0
-    DEG(4,66,8) = 1
-    DEG(4,66,9) = 0
-    DEG(4,66,10) = 0
-  COEF(4,66) = (1.4332583965298273, 0)
-    DEG(4,67,1) = 0
-    DEG(4,67,2) = 0
-    DEG(4,67,3) = 0
-    DEG(4,67,4) = 0
-    DEG(4,67,5) = 1
-    DEG(4,67,6) = 0
-    DEG(4,67,7) = 0
-    DEG(4,67,8) = 1
-    DEG(4,67,9) = 0
-    DEG(4,67,10) = 0
-  COEF(4,67) = (-0.3658292969614953, 0)
-    DEG(4,68,1) = 0
-    DEG(4,68,2) = 0
-    DEG(4,68,3) = 0
-    DEG(4,68,4) = 0
-    DEG(4,68,5) = 0
-    DEG(4,68,6) = 1
-    DEG(4,68,7) = 0
-    DEG(4,68,8) = 1
-    DEG(4,68,9) = 0
-    DEG(4,68,10) = 0
-  COEF(4,68) = (-0.458292808629767, 0)
-    DEG(4,69,1) = 0
-    DEG(4,69,2) = 0
-    DEG(4,69,3) = 0
-    DEG(4,69,4) = 0
-    DEG(4,69,5) = 0
-    DEG(4,69,6) = 0
-    DEG(4,69,7) = 0
-    DEG(4,69,8) = 0
-    DEG(4,69,9) = 1
-    DEG(4,69,10) = 0
-  COEF(4,69) = (1.1057480001700448, 0)
-    DEG(4,70,1) = 0
-    DEG(4,70,2) = 0
-    DEG(4,70,3) = 0
-    DEG(4,70,4) = 1
-    DEG(4,70,5) = 0
-    DEG(4,70,6) = 0
-    DEG(4,70,7) = 0
-    DEG(4,70,8) = 0
-    DEG(4,70,9) = 1
-    DEG(4,70,10) = 0
-  COEF(4,70) = (0.649216154064302, 0)
-    DEG(4,71,1) = 0
-    DEG(4,71,2) = 0
-    DEG(4,71,3) = 0
-    DEG(4,71,4) = 0
-    DEG(4,71,5) = 1
-    DEG(4,71,6) = 0
-    DEG(4,71,7) = 0
-    DEG(4,71,8) = 0
-    DEG(4,71,9) = 1
-    DEG(4,71,10) = 0
-  COEF(4,71) = (0.1435470147844548, 0)
-    DEG(4,72,1) = 0
-    DEG(4,72,2) = 0
-    DEG(4,72,3) = 0
-    DEG(4,72,4) = 0
-    DEG(4,72,5) = 0
-    DEG(4,72,6) = 1
-    DEG(4,72,7) = 0
-    DEG(4,72,8) = 0
-    DEG(4,72,9) = 1
-    DEG(4,72,10) = 0
-  COEF(4,72) = (1.8049686045262234, 0)
-    DEG(4,73,1) = 0
-    DEG(4,73,2) = 0
-    DEG(4,73,3) = 0
-    DEG(4,73,4) = 0
-    DEG(4,73,5) = 0
-    DEG(4,73,6) = 0
-    DEG(4,73,7) = 0
-    DEG(4,73,8) = 0
-    DEG(4,73,9) = 0
-    DEG(4,73,10) = 1
-  COEF(4,73) = (0.3619641675513017, 0)
-    DEG(4,74,1) = 0
-    DEG(4,74,2) = 0
-    DEG(4,74,3) = 0
-    DEG(4,74,4) = 1
-    DEG(4,74,5) = 0
-    DEG(4,74,6) = 0
-    DEG(4,74,7) = 0
-    DEG(4,74,8) = 0
-    DEG(4,74,9) = 0
-    DEG(4,74,10) = 1
-  COEF(4,74) = (1.0386298649000567, 0)
-    DEG(4,75,1) = 0
-    DEG(4,75,2) = 0
-    DEG(4,75,3) = 0
-    DEG(4,75,4) = 0
-    DEG(4,75,5) = 1
-    DEG(4,75,6) = 0
-    DEG(4,75,7) = 0
-    DEG(4,75,8) = 0
-    DEG(4,75,9) = 0
-    DEG(4,75,10) = 1
-  COEF(4,75) = (-0.2739870731830222, 0)
-    DEG(4,76,1) = 0
-    DEG(4,76,2) = 0
-    DEG(4,76,3) = 0
-    DEG(4,76,4) = 0
-    DEG(4,76,5) = 0
-    DEG(4,76,6) = 1
-    DEG(4,76,7) = 0
-    DEG(4,76,8) = 0
-    DEG(4,76,9) = 0
-    DEG(4,76,10) = 1
-  COEF(4,76) = (-0.38992289294835114, 0)
-
-NUM_TERMS(5) = 76
-    DEG(5,1,1) = 2
-    DEG(5,1,2) = 0
-    DEG(5,1,3) = 0
-    DEG(5,1,4) = 0
-    DEG(5,1,5) = 0
-    DEG(5,1,6) = 0
-    DEG(5,1,7) = 0
-    DEG(5,1,8) = 0
-    DEG(5,1,9) = 0
-    DEG(5,1,10) = 0
-  COEF(5,1) = (-0.41615764608945516, 0)
-    DEG(5,2,1) = 1
-    DEG(5,2,2) = 1
-    DEG(5,2,3) = 0
-    DEG(5,2,4) = 0
-    DEG(5,2,5) = 0
-    DEG(5,2,6) = 0
-    DEG(5,2,7) = 0
-    DEG(5,2,8) = 0
-    DEG(5,2,9) = 0
-    DEG(5,2,10) = 0
-  COEF(5,2) = (-1.2331171001793817, 0)
-    DEG(5,3,1) = 0
-    DEG(5,3,2) = 2
-    DEG(5,3,3) = 0
-    DEG(5,3,4) = 0
-    DEG(5,3,5) = 0
-    DEG(5,3,6) = 0
-    DEG(5,3,7) = 0
-    DEG(5,3,8) = 0
-    DEG(5,3,9) = 0
-    DEG(5,3,10) = 0
-  COEF(5,3) = (0.10423594498637195, 0)
-    DEG(5,4,1) = 1
-    DEG(5,4,2) = 0
-    DEG(5,4,3) = 1
-    DEG(5,4,4) = 0
-    DEG(5,4,5) = 0
-    DEG(5,4,6) = 0
-    DEG(5,4,7) = 0
-    DEG(5,4,8) = 0
-    DEG(5,4,9) = 0
-    DEG(5,4,10) = 0
-  COEF(5,4) = (0.4451741240918564, 0)
-    DEG(5,5,1) = 0
-    DEG(5,5,2) = 1
-    DEG(5,5,3) = 1
-    DEG(5,5,4) = 0
-    DEG(5,5,5) = 0
-    DEG(5,5,6) = 0
-    DEG(5,5,7) = 0
-    DEG(5,5,8) = 0
-    DEG(5,5,9) = 0
-    DEG(5,5,10) = 0
-  COEF(5,5) = (-0.0807794759847403, 0)
-    DEG(5,6,1) = 0
-    DEG(5,6,2) = 0
-    DEG(5,6,3) = 2
-    DEG(5,6,4) = 0
-    DEG(5,6,5) = 0
-    DEG(5,6,6) = 0
-    DEG(5,6,7) = 0
-    DEG(5,6,8) = 0
-    DEG(5,6,9) = 0
-    DEG(5,6,10) = 0
-  COEF(5,6) = (0.015584822151867354, 0)
-    DEG(5,7,1) = 2
-    DEG(5,7,2) = 0
-    DEG(5,7,3) = 0
-    DEG(5,7,4) = 1
-    DEG(5,7,5) = 0
-    DEG(5,7,6) = 0
-    DEG(5,7,7) = 0
-    DEG(5,7,8) = 0
-    DEG(5,7,9) = 0
-    DEG(5,7,10) = 0
-  COEF(5,7) = (0.5169791211840113, 0)
-    DEG(5,8,1) = 1
-    DEG(5,8,2) = 1
-    DEG(5,8,3) = 0
-    DEG(5,8,4) = 1
-    DEG(5,8,5) = 0
-    DEG(5,8,6) = 0
-    DEG(5,8,7) = 0
-    DEG(5,8,8) = 0
-    DEG(5,8,9) = 0
-    DEG(5,8,10) = 0
-  COEF(5,8) = (-0.3281633186673521, 0)
-    DEG(5,9,1) = 0
-    DEG(5,9,2) = 2
-    DEG(5,9,3) = 0
-    DEG(5,9,4) = 1
-    DEG(5,9,5) = 0
-    DEG(5,9,6) = 0
-    DEG(5,9,7) = 0
-    DEG(5,9,8) = 0
-    DEG(5,9,9) = 0
-    DEG(5,9,10) = 0
-  COEF(5,9) = (0.10768082059655043, 0)
-    DEG(5,10,1) = 1
-    DEG(5,10,2) = 0
-    DEG(5,10,3) = 1
-    DEG(5,10,4) = 1
-    DEG(5,10,5) = 0
-    DEG(5,10,6) = 0
-    DEG(5,10,7) = 0
-    DEG(5,10,8) = 0
-    DEG(5,10,9) = 0
-    DEG(5,10,10) = 0
-  COEF(5,10) = (-1.78387184821123, 0)
-    DEG(5,11,1) = 0
-    DEG(5,11,2) = 1
-    DEG(5,11,3) = 1
-    DEG(5,11,4) = 1
-    DEG(5,11,5) = 0
-    DEG(5,11,6) = 0
-    DEG(5,11,7) = 0
-    DEG(5,11,8) = 0
-    DEG(5,11,9) = 0
-    DEG(5,11,10) = 0
-  COEF(5,11) = (0.1962385955438586, 0)
-    DEG(5,12,1) = 0
-    DEG(5,12,2) = 0
-    DEG(5,12,3) = 2
-    DEG(5,12,4) = 1
-    DEG(5,12,5) = 0
-    DEG(5,12,6) = 0
-    DEG(5,12,7) = 0
-    DEG(5,12,8) = 0
-    DEG(5,12,9) = 0
-    DEG(5,12,10) = 0
-  COEF(5,12) = (-0.0932755727182936, 0)
-    DEG(5,13,1) = 2
-    DEG(5,13,2) = 0
-    DEG(5,13,3) = 0
-    DEG(5,13,4) = 2
-    DEG(5,13,5) = 0
-    DEG(5,13,6) = 0
-    DEG(5,13,7) = 0
-    DEG(5,13,8) = 0
-    DEG(5,13,9) = 0
-    DEG(5,13,10) = 0
-  COEF(5,13) = (-0.12307658314371513, 0)
-    DEG(5,14,1) = 1
-    DEG(5,14,2) = 1
-    DEG(5,14,3) = 0
-    DEG(5,14,4) = 2
-    DEG(5,14,5) = 0
-    DEG(5,14,6) = 0
-    DEG(5,14,7) = 0
-    DEG(5,14,8) = 0
-    DEG(5,14,9) = 0
-    DEG(5,14,10) = 0
-  COEF(5,14) = (1.3649915585405705, 0)
-    DEG(5,15,1) = 0
-    DEG(5,15,2) = 2
-    DEG(5,15,3) = 0
-    DEG(5,15,4) = 2
-    DEG(5,15,5) = 0
-    DEG(5,15,6) = 0
-    DEG(5,15,7) = 0
-    DEG(5,15,8) = 0
-    DEG(5,15,9) = 0
-    DEG(5,15,10) = 0
-  COEF(5,15) = (-0.01641144275933561, 0)
-    DEG(5,16,1) = 1
-    DEG(5,16,2) = 0
-    DEG(5,16,3) = 1
-    DEG(5,16,4) = 2
-    DEG(5,16,5) = 0
-    DEG(5,16,6) = 0
-    DEG(5,16,7) = 0
-    DEG(5,16,8) = 0
-    DEG(5,16,9) = 0
-    DEG(5,16,10) = 0
-  COEF(5,16) = (1.282522294958988, 0)
-    DEG(5,17,1) = 0
-    DEG(5,17,2) = 1
-    DEG(5,17,3) = 1
-    DEG(5,17,4) = 2
-    DEG(5,17,5) = 0
-    DEG(5,17,6) = 0
-    DEG(5,17,7) = 0
-    DEG(5,17,8) = 0
-    DEG(5,17,9) = 0
-    DEG(5,17,10) = 0
-  COEF(5,17) = (0.13118389677242223, 0)
-    DEG(5,18,1) = 0
-    DEG(5,18,2) = 0
-    DEG(5,18,3) = 2
-    DEG(5,18,4) = 2
-    DEG(5,18,5) = 0
-    DEG(5,18,6) = 0
-    DEG(5,18,7) = 0
-    DEG(5,18,8) = 0
-    DEG(5,18,9) = 0
-    DEG(5,18,10) = 0
-  COEF(5,18) = (0.13948802590305073, 0)
-    DEG(5,19,1) = 2
-    DEG(5,19,2) = 0
-    DEG(5,19,3) = 0
-    DEG(5,19,4) = 0
-    DEG(5,19,5) = 1
-    DEG(5,19,6) = 0
-    DEG(5,19,7) = 0
-    DEG(5,19,8) = 0
-    DEG(5,19,9) = 0
-    DEG(5,19,10) = 0
-  COEF(5,19) = (-0.4784260518169776, 0)
-    DEG(5,20,1) = 1
-    DEG(5,20,2) = 1
-    DEG(5,20,3) = 0
-    DEG(5,20,4) = 0
-    DEG(5,20,5) = 1
-    DEG(5,20,6) = 0
-    DEG(5,20,7) = 0
-    DEG(5,20,8) = 0
-    DEG(5,20,9) = 0
-    DEG(5,20,10) = 0
-  COEF(5,20) = (-2.092134198423298, 0)
-    DEG(5,21,1) = 0
-    DEG(5,21,2) = 2
-    DEG(5,21,3) = 0
-    DEG(5,21,4) = 0
-    DEG(5,21,5) = 1
-    DEG(5,21,6) = 0
-    DEG(5,21,7) = 0
-    DEG(5,21,8) = 0
-    DEG(5,21,9) = 0
-    DEG(5,21,10) = 0
-  COEF(5,21) = (-0.2652478875380973, 0)
-    DEG(5,22,1) = 1
-    DEG(5,22,2) = 0
-    DEG(5,22,3) = 1
-    DEG(5,22,4) = 0
-    DEG(5,22,5) = 1
-    DEG(5,22,6) = 0
-    DEG(5,22,7) = 0
-    DEG(5,22,8) = 0
-    DEG(5,22,9) = 0
-    DEG(5,22,10) = 0
-  COEF(5,22) = (-0.9322070346912057, 0)
-    DEG(5,23,1) = 0
-    DEG(5,23,2) = 1
-    DEG(5,23,3) = 1
-    DEG(5,23,4) = 0
-    DEG(5,23,5) = 1
-    DEG(5,23,6) = 0
-    DEG(5,23,7) = 0
-    DEG(5,23,8) = 0
-    DEG(5,23,9) = 0
-    DEG(5,23,10) = 0
-  COEF(5,23) = (0.28229645793462466, 0)
-    DEG(5,24,1) = 0
-    DEG(5,24,2) = 0
-    DEG(5,24,3) = 2
-    DEG(5,24,4) = 0
-    DEG(5,24,5) = 1
-    DEG(5,24,6) = 0
-    DEG(5,24,7) = 0
-    DEG(5,24,8) = 0
-    DEG(5,24,9) = 0
-    DEG(5,24,10) = 0
-  COEF(5,24) = (-0.07438003692790207, 0)
-    DEG(5,25,1) = 2
-    DEG(5,25,2) = 0
-    DEG(5,25,3) = 0
-    DEG(5,25,4) = 1
-    DEG(5,25,5) = 1
-    DEG(5,25,6) = 0
-    DEG(5,25,7) = 0
-    DEG(5,25,8) = 0
-    DEG(5,25,9) = 0
-    DEG(5,25,10) = 0
-  COEF(5,25) = (0.1376969425780227, 0)
-    DEG(5,26,1) = 1
-    DEG(5,26,2) = 1
-    DEG(5,26,3) = 0
-    DEG(5,26,4) = 1
-    DEG(5,26,5) = 1
-    DEG(5,26,6) = 0
-    DEG(5,26,7) = 0
-    DEG(5,26,8) = 0
-    DEG(5,26,9) = 0
-    DEG(5,26,10) = 0
-  COEF(5,26) = (-1.3462021315216954, 0)
-    DEG(5,27,1) = 0
-    DEG(5,27,2) = 2
-    DEG(5,27,3) = 0
-    DEG(5,27,4) = 1
-    DEG(5,27,5) = 1
-    DEG(5,27,6) = 0
-    DEG(5,27,7) = 0
-    DEG(5,27,8) = 0
-    DEG(5,27,9) = 0
-    DEG(5,27,10) = 0
-  COEF(5,27) = (-0.35831006800801096, 0)
-    DEG(5,28,1) = 1
-    DEG(5,28,2) = 0
-    DEG(5,28,3) = 1
-    DEG(5,28,4) = 1
-    DEG(5,28,5) = 1
-    DEG(5,28,6) = 0
-    DEG(5,28,7) = 0
-    DEG(5,28,8) = 0
-    DEG(5,28,9) = 0
-    DEG(5,28,10) = 0
-  COEF(5,28) = (-0.3236078908735904, 0)
-    DEG(5,29,1) = 0
-    DEG(5,29,2) = 1
-    DEG(5,29,3) = 1
-    DEG(5,29,4) = 1
-    DEG(5,29,5) = 1
-    DEG(5,29,6) = 0
-    DEG(5,29,7) = 0
-    DEG(5,29,8) = 0
-    DEG(5,29,9) = 0
-    DEG(5,29,10) = 0
-  COEF(5,29) = (-0.23312973570099904, 0)
-    DEG(5,30,1) = 0
-    DEG(5,30,2) = 0
-    DEG(5,30,3) = 2
-    DEG(5,30,4) = 1
-    DEG(5,30,5) = 1
-    DEG(5,30,6) = 0
-    DEG(5,30,7) = 0
-    DEG(5,30,8) = 0
-    DEG(5,30,9) = 0
-    DEG(5,30,10) = 0
-  COEF(5,30) = (0.2206131254299883, 0)
-    DEG(5,31,1) = 2
-    DEG(5,31,2) = 0
-    DEG(5,31,3) = 0
-    DEG(5,31,4) = 0
-    DEG(5,31,5) = 2
-    DEG(5,31,6) = 0
-    DEG(5,31,7) = 0
-    DEG(5,31,8) = 0
-    DEG(5,31,9) = 0
-    DEG(5,31,10) = 0
-  COEF(5,31) = (0.03212463900566726, 0)
-    DEG(5,32,1) = 1
-    DEG(5,32,2) = 1
-    DEG(5,32,3) = 0
-    DEG(5,32,4) = 0
-    DEG(5,32,5) = 2
-    DEG(5,32,6) = 0
-    DEG(5,32,7) = 0
-    DEG(5,32,8) = 0
-    DEG(5,32,9) = 0
-    DEG(5,32,10) = 0
-  COEF(5,32) = (-0.543299069419884, 0)
-    DEG(5,33,1) = 0
-    DEG(5,33,2) = 2
-    DEG(5,33,3) = 0
-    DEG(5,33,4) = 0
-    DEG(5,33,5) = 2
-    DEG(5,33,6) = 0
-    DEG(5,33,7) = 0
-    DEG(5,33,8) = 0
-    DEG(5,33,9) = 0
-    DEG(5,33,10) = 0
-  COEF(5,33) = (-0.1081313237618179, 0)
-    DEG(5,34,1) = 1
-    DEG(5,34,2) = 0
-    DEG(5,34,3) = 1
-    DEG(5,34,4) = 0
-    DEG(5,34,5) = 2
-    DEG(5,34,6) = 0
-    DEG(5,34,7) = 0
-    DEG(5,34,8) = 0
-    DEG(5,34,9) = 0
-    DEG(5,34,10) = 0
-  COEF(5,34) = (-1.8348908578280814, 0)
-    DEG(5,35,1) = 0
-    DEG(5,35,2) = 1
-    DEG(5,35,3) = 1
-    DEG(5,35,4) = 0
-    DEG(5,35,5) = 2
-    DEG(5,35,6) = 0
-    DEG(5,35,7) = 0
-    DEG(5,35,8) = 0
-    DEG(5,35,9) = 0
-    DEG(5,35,10) = 0
-  COEF(5,35) = (-0.3379484782876818, 0)
-    DEG(5,36,1) = 0
-    DEG(5,36,2) = 0
-    DEG(5,36,3) = 2
-    DEG(5,36,4) = 0
-    DEG(5,36,5) = 2
-    DEG(5,36,6) = 0
-    DEG(5,36,7) = 0
-    DEG(5,36,8) = 0
-    DEG(5,36,9) = 0
-    DEG(5,36,10) = 0
-  COEF(5,36) = (0.07600668475615065, 0)
-    DEG(5,37,1) = 2
-    DEG(5,37,2) = 0
-    DEG(5,37,3) = 0
-    DEG(5,37,4) = 0
-    DEG(5,37,5) = 0
-    DEG(5,37,6) = 1
-    DEG(5,37,7) = 0
-    DEG(5,37,8) = 0
-    DEG(5,37,9) = 0
-    DEG(5,37,10) = 0
-  COEF(5,37) = (0.6002572265406737, 0)
-    DEG(5,38,1) = 1
-    DEG(5,38,2) = 1
-    DEG(5,38,3) = 0
-    DEG(5,38,4) = 0
-    DEG(5,38,5) = 0
-    DEG(5,38,6) = 1
-    DEG(5,38,7) = 0
-    DEG(5,38,8) = 0
-    DEG(5,38,9) = 0
-    DEG(5,38,10) = 0
-  COEF(5,38) = (0.1802055521069689, 0)
-    DEG(5,39,1) = 0
-    DEG(5,39,2) = 2
-    DEG(5,39,3) = 0
-    DEG(5,39,4) = 0
-    DEG(5,39,5) = 0
-    DEG(5,39,6) = 1
-    DEG(5,39,7) = 0
-    DEG(5,39,8) = 0
-    DEG(5,39,9) = 0
-    DEG(5,39,10) = 0
-  COEF(5,39) = (1.5644331744196656, 0)
-    DEG(5,40,1) = 1
-    DEG(5,40,2) = 0
-    DEG(5,40,3) = 1
-    DEG(5,40,4) = 0
-    DEG(5,40,5) = 0
-    DEG(5,40,6) = 1
-    DEG(5,40,7) = 0
-    DEG(5,40,8) = 0
-    DEG(5,40,9) = 0
-    DEG(5,40,10) = 0
-  COEF(5,40) = (-0.5267676534246675, 0)
-    DEG(5,41,1) = 0
-    DEG(5,41,2) = 1
-    DEG(5,41,3) = 1
-    DEG(5,41,4) = 0
-    DEG(5,41,5) = 0
-    DEG(5,41,6) = 1
-    DEG(5,41,7) = 0
-    DEG(5,41,8) = 0
-    DEG(5,41,9) = 0
-    DEG(5,41,10) = 0
-  COEF(5,41) = (-1.676157338774887, 0)
-    DEG(5,42,1) = 0
-    DEG(5,42,2) = 0
-    DEG(5,42,3) = 2
-    DEG(5,42,4) = 0
-    DEG(5,42,5) = 0
-    DEG(5,42,6) = 1
-    DEG(5,42,7) = 0
-    DEG(5,42,8) = 0
-    DEG(5,42,9) = 0
-    DEG(5,42,10) = 0
-  COEF(5,42) = (0.4008307913692461, 0)
-    DEG(5,43,1) = 2
-    DEG(5,43,2) = 0
-    DEG(5,43,3) = 0
-    DEG(5,43,4) = 1
-    DEG(5,43,5) = 0
-    DEG(5,43,6) = 1
-    DEG(5,43,7) = 0
-    DEG(5,43,8) = 0
-    DEG(5,43,9) = 0
-    DEG(5,43,10) = 0
-  COEF(5,43) = (-0.5875157312206984, 0)
-    DEG(5,44,1) = 1
-    DEG(5,44,2) = 1
-    DEG(5,44,3) = 0
-    DEG(5,44,4) = 1
-    DEG(5,44,5) = 0
-    DEG(5,44,6) = 1
-    DEG(5,44,7) = 0
-    DEG(5,44,8) = 0
-    DEG(5,44,9) = 0
-    DEG(5,44,10) = 0
-  COEF(5,44) = (-0.26794777918572443, 0)
-    DEG(5,45,1) = 0
-    DEG(5,45,2) = 2
-    DEG(5,45,3) = 0
-    DEG(5,45,4) = 1
-    DEG(5,45,5) = 0
-    DEG(5,45,6) = 1
-    DEG(5,45,7) = 0
-    DEG(5,45,8) = 0
-    DEG(5,45,9) = 0
-    DEG(5,45,10) = 0
-  COEF(5,45) = (1.8161766879761405, 0)
-    DEG(5,46,1) = 1
-    DEG(5,46,2) = 0
-    DEG(5,46,3) = 1
-    DEG(5,46,4) = 1
-    DEG(5,46,5) = 0
-    DEG(5,46,6) = 1
-    DEG(5,46,7) = 0
-    DEG(5,46,8) = 0
-    DEG(5,46,9) = 0
-    DEG(5,46,10) = 0
-  COEF(5,46) = (0.08217873131336825, 0)
-    DEG(5,47,1) = 0
-    DEG(5,47,2) = 1
-    DEG(5,47,3) = 1
-    DEG(5,47,4) = 1
-    DEG(5,47,5) = 0
-    DEG(5,47,6) = 1
-    DEG(5,47,7) = 0
-    DEG(5,47,8) = 0
-    DEG(5,47,9) = 0
-    DEG(5,47,10) = 0
-  COEF(5,47) = (0.41625228622759664, 0)
-    DEG(5,48,1) = 0
-    DEG(5,48,2) = 0
-    DEG(5,48,3) = 2
-    DEG(5,48,4) = 1
-    DEG(5,48,5) = 0
-    DEG(5,48,6) = 1
-    DEG(5,48,7) = 0
-    DEG(5,48,8) = 0
-    DEG(5,48,9) = 0
-    DEG(5,48,10) = 0
-  COEF(5,48) = (-1.228660956755442, 0)
-    DEG(5,49,1) = 2
-    DEG(5,49,2) = 0
-    DEG(5,49,3) = 0
-    DEG(5,49,4) = 0
-    DEG(5,49,5) = 1
-    DEG(5,49,6) = 1
-    DEG(5,49,7) = 0
-    DEG(5,49,8) = 0
-    DEG(5,49,9) = 0
-    DEG(5,49,10) = 0
-  COEF(5,49) = (0.801736157469905, 0)
-    DEG(5,50,1) = 1
-    DEG(5,50,2) = 1
-    DEG(5,50,3) = 0
-    DEG(5,50,4) = 0
-    DEG(5,50,5) = 1
-    DEG(5,50,6) = 1
-    DEG(5,50,7) = 0
-    DEG(5,50,8) = 0
-    DEG(5,50,9) = 0
-    DEG(5,50,10) = 0
-  COEF(5,50) = (-0.06119905069237429, 0)
-    DEG(5,51,1) = 0
-    DEG(5,51,2) = 2
-    DEG(5,51,3) = 0
-    DEG(5,51,4) = 0
-    DEG(5,51,5) = 1
-    DEG(5,51,6) = 1
-    DEG(5,51,7) = 0
-    DEG(5,51,8) = 0
-    DEG(5,51,9) = 0
-    DEG(5,51,10) = 0
-  COEF(5,51) = (0.5320140756032581, 0)
-    DEG(5,52,1) = 1
-    DEG(5,52,2) = 0
-    DEG(5,52,3) = 1
-    DEG(5,52,4) = 0
-    DEG(5,52,5) = 1
-    DEG(5,52,6) = 1
-    DEG(5,52,7) = 0
-    DEG(5,52,8) = 0
-    DEG(5,52,9) = 0
-    DEG(5,52,10) = 0
-  COEF(5,52) = (-0.5120321678148483, 0)
-    DEG(5,53,1) = 0
-    DEG(5,53,2) = 1
-    DEG(5,53,3) = 1
-    DEG(5,53,4) = 0
-    DEG(5,53,5) = 1
-    DEG(5,53,6) = 1
-    DEG(5,53,7) = 0
-    DEG(5,53,8) = 0
-    DEG(5,53,9) = 0
-    DEG(5,53,10) = 0
-  COEF(5,53) = (1.3994959245799465, 0)
-    DEG(5,54,1) = 0
-    DEG(5,54,2) = 0
-    DEG(5,54,3) = 2
-    DEG(5,54,4) = 0
-    DEG(5,54,5) = 1
-    DEG(5,54,6) = 1
-    DEG(5,54,7) = 0
-    DEG(5,54,8) = 0
-    DEG(5,54,9) = 0
-    DEG(5,54,10) = 0
-  COEF(5,54) = (-1.3337502330731632, 0)
-    DEG(5,55,1) = 2
-    DEG(5,55,2) = 0
-    DEG(5,55,3) = 0
-    DEG(5,55,4) = 0
-    DEG(5,55,5) = 0
-    DEG(5,55,6) = 2
-    DEG(5,55,7) = 0
-    DEG(5,55,8) = 0
-    DEG(5,55,9) = 0
-    DEG(5,55,10) = 0
-  COEF(5,55) = (0.09095194413804787, 0)
-    DEG(5,56,1) = 1
-    DEG(5,56,2) = 1
-    DEG(5,56,3) = 0
-    DEG(5,56,4) = 0
-    DEG(5,56,5) = 0
-    DEG(5,56,6) = 2
-    DEG(5,56,7) = 0
-    DEG(5,56,8) = 0
-    DEG(5,56,9) = 0
-    DEG(5,56,10) = 0
-  COEF(5,56) = (-0.8216924891206866, 0)
-    DEG(5,57,1) = 0
-    DEG(5,57,2) = 2
-    DEG(5,57,3) = 0
-    DEG(5,57,4) = 0
-    DEG(5,57,5) = 0
-    DEG(5,57,6) = 2
-    DEG(5,57,7) = 0
-    DEG(5,57,8) = 0
-    DEG(5,57,9) = 0
-    DEG(5,57,10) = 0
-  COEF(5,57) = (0.12454276652115351, 0)
-    DEG(5,58,1) = 1
-    DEG(5,58,2) = 0
-    DEG(5,58,3) = 1
-    DEG(5,58,4) = 0
-    DEG(5,58,5) = 0
-    DEG(5,58,6) = 2
-    DEG(5,58,7) = 0
-    DEG(5,58,8) = 0
-    DEG(5,58,9) = 0
-    DEG(5,58,10) = 0
-  COEF(5,58) = (0.5523685628690934, 0)
-    DEG(5,59,1) = 0
-    DEG(5,59,2) = 1
-    DEG(5,59,3) = 1
-    DEG(5,59,4) = 0
-    DEG(5,59,5) = 0
-    DEG(5,59,6) = 2
-    DEG(5,59,7) = 0
-    DEG(5,59,8) = 0
-    DEG(5,59,9) = 0
-    DEG(5,59,10) = 0
-  COEF(5,59) = (0.20676458151525956, 0)
-    DEG(5,60,1) = 0
-    DEG(5,60,2) = 0
-    DEG(5,60,3) = 2
-    DEG(5,60,4) = 0
-    DEG(5,60,5) = 0
-    DEG(5,60,6) = 2
-    DEG(5,60,7) = 0
-    DEG(5,60,8) = 0
-    DEG(5,60,9) = 0
-    DEG(5,60,10) = 0
-  COEF(5,60) = (-0.2154947106592014, 0)
-    DEG(5,61,1) = 0
-    DEG(5,61,2) = 0
-    DEG(5,61,3) = 0
-    DEG(5,61,4) = 0
-    DEG(5,61,5) = 0
-    DEG(5,61,6) = 0
-    DEG(5,61,7) = 1
-    DEG(5,61,8) = 0
-    DEG(5,61,9) = 0
-    DEG(5,61,10) = 0
-  COEF(5,61) = (0.29633687895121585, 0)
-    DEG(5,62,1) = 0
-    DEG(5,62,2) = 0
-    DEG(5,62,3) = 0
-    DEG(5,62,4) = 1
-    DEG(5,62,5) = 0
-    DEG(5,62,6) = 0
-    DEG(5,62,7) = 1
-    DEG(5,62,8) = 0
-    DEG(5,62,9) = 0
-    DEG(5,62,10) = 0
-  COEF(5,62) = (-0.5313843690622682, 0)
-    DEG(5,63,1) = 0
-    DEG(5,63,2) = 0
-    DEG(5,63,3) = 0
-    DEG(5,63,4) = 0
-    DEG(5,63,5) = 1
-    DEG(5,63,6) = 0
-    DEG(5,63,7) = 1
-    DEG(5,63,8) = 0
-    DEG(5,63,9) = 0
-    DEG(5,63,10) = 0
-  COEF(5,63) = (0.8180539762829769, 0)
-    DEG(5,64,1) = 0
-    DEG(5,64,2) = 0
-    DEG(5,64,3) = 0
-    DEG(5,64,4) = 0
-    DEG(5,64,5) = 0
-    DEG(5,64,6) = 1
-    DEG(5,64,7) = 1
-    DEG(5,64,8) = 0
-    DEG(5,64,9) = 0
-    DEG(5,64,10) = 0
-  COEF(5,64) = (-2.5655211923295855, 0)
-    DEG(5,65,1) = 0
-    DEG(5,65,2) = 0
-    DEG(5,65,3) = 0
-    DEG(5,65,4) = 0
-    DEG(5,65,5) = 0
-    DEG(5,65,6) = 0
-    DEG(5,65,7) = 0
-    DEG(5,65,8) = 1
-    DEG(5,65,9) = 0
-    DEG(5,65,10) = 0
-  COEF(5,65) = (-1.2602089223582702, 0)
-    DEG(5,66,1) = 0
-    DEG(5,66,2) = 0
-    DEG(5,66,3) = 0
-    DEG(5,66,4) = 1
-    DEG(5,66,5) = 0
-    DEG(5,66,6) = 0
-    DEG(5,66,7) = 0
-    DEG(5,66,8) = 1
-    DEG(5,66,9) = 0
-    DEG(5,66,10) = 0
-  COEF(5,66) = (1.1609512634985952, 0)
-    DEG(5,67,1) = 0
-    DEG(5,67,2) = 0
-    DEG(5,67,3) = 0
-    DEG(5,67,4) = 0
-    DEG(5,67,5) = 1
-    DEG(5,67,6) = 0
-    DEG(5,67,7) = 0
-    DEG(5,67,8) = 1
-    DEG(5,67,9) = 0
-    DEG(5,67,10) = 0
-  COEF(5,67) = (-1.5289512288758575, 0)
-    DEG(5,68,1) = 0
-    DEG(5,68,2) = 0
-    DEG(5,68,3) = 0
-    DEG(5,68,4) = 0
-    DEG(5,68,5) = 0
-    DEG(5,68,6) = 1
-    DEG(5,68,7) = 0
-    DEG(5,68,8) = 1
-    DEG(5,68,9) = 0
-    DEG(5,68,10) = 0
-  COEF(5,68) = (-0.17424561505966216, 0)
-    DEG(5,69,1) = 0
-    DEG(5,69,2) = 0
-    DEG(5,69,3) = 0
-    DEG(5,69,4) = 0
-    DEG(5,69,5) = 0
-    DEG(5,69,6) = 0
-    DEG(5,69,7) = 0
-    DEG(5,69,8) = 0
-    DEG(5,69,9) = 1
-    DEG(5,69,10) = 0
-  COEF(5,69) = (0.10364901876603111, 0)
-    DEG(5,70,1) = 0
-    DEG(5,70,2) = 0
-    DEG(5,70,3) = 0
-    DEG(5,70,4) = 1
-    DEG(5,70,5) = 0
-    DEG(5,70,6) = 0
-    DEG(5,70,7) = 0
-    DEG(5,70,8) = 0
-    DEG(5,70,9) = 1
-    DEG(5,70,10) = 0
-  COEF(5,70) = (-0.013973408764994696, 0)
-    DEG(5,71,1) = 0
-    DEG(5,71,2) = 0
-    DEG(5,71,3) = 0
-    DEG(5,71,4) = 0
-    DEG(5,71,5) = 1
-    DEG(5,71,6) = 0
-    DEG(5,71,7) = 0
-    DEG(5,71,8) = 0
-    DEG(5,71,9) = 1
-    DEG(5,71,10) = 0
-  COEF(5,71) = (-0.30080374272031296, 0)
-    DEG(5,72,1) = 0
-    DEG(5,72,2) = 0
-    DEG(5,72,3) = 0
-    DEG(5,72,4) = 0
-    DEG(5,72,5) = 0
-    DEG(5,72,6) = 1
-    DEG(5,72,7) = 0
-    DEG(5,72,8) = 0
-    DEG(5,72,9) = 1
-    DEG(5,72,10) = 0
-  COEF(5,72) = (1.5473286276087392, 0)
-    DEG(5,73,1) = 0
-    DEG(5,73,2) = 0
-    DEG(5,73,3) = 0
-    DEG(5,73,4) = 0
-    DEG(5,73,5) = 0
-    DEG(5,73,6) = 0
-    DEG(5,73,7) = 0
-    DEG(5,73,8) = 0
-    DEG(5,73,9) = 0
-    DEG(5,73,10) = 1
-  COEF(5,73) = (-0.04276145686338927, 0)
-    DEG(5,74,1) = 0
-    DEG(5,74,2) = 0
-    DEG(5,74,3) = 0
-    DEG(5,74,4) = 1
-    DEG(5,74,5) = 0
-    DEG(5,74,6) = 0
-    DEG(5,74,7) = 0
-    DEG(5,74,8) = 0
-    DEG(5,74,9) = 0
-    DEG(5,74,10) = 1
-  COEF(5,74) = (0.12497482938060817, 0)
-    DEG(5,75,1) = 0
-    DEG(5,75,2) = 0
-    DEG(5,75,3) = 0
-    DEG(5,75,4) = 0
-    DEG(5,75,5) = 1
-    DEG(5,75,6) = 0
-    DEG(5,75,7) = 0
-    DEG(5,75,8) = 0
-    DEG(5,75,9) = 0
-    DEG(5,75,10) = 1
-  COEF(5,75) = (0.06337974500071619, 0)
-    DEG(5,76,1) = 0
-    DEG(5,76,2) = 0
-    DEG(5,76,3) = 0
-    DEG(5,76,4) = 0
-    DEG(5,76,5) = 0
-    DEG(5,76,6) = 1
-    DEG(5,76,7) = 0
-    DEG(5,76,8) = 0
-    DEG(5,76,9) = 0
-    DEG(5,76,10) = 1
-  COEF(5,76) = (-1.1223229062458282, 0)
-
-NUM_TERMS(6) = 76
-    DEG(6,1,1) = 2
-    DEG(6,1,2) = 0
-    DEG(6,1,3) = 0
-    DEG(6,1,4) = 0
-    DEG(6,1,5) = 0
-    DEG(6,1,6) = 0
-    DEG(6,1,7) = 0
-    DEG(6,1,8) = 0
-    DEG(6,1,9) = 0
-    DEG(6,1,10) = 0
-  COEF(6,1) = (0.0995239208560676, 0)
-    DEG(6,2,1) = 1
-    DEG(6,2,2) = 1
-    DEG(6,2,3) = 0
-    DEG(6,2,4) = 0
-    DEG(6,2,5) = 0
-    DEG(6,2,6) = 0
-    DEG(6,2,7) = 0
-    DEG(6,2,8) = 0
-    DEG(6,2,9) = 0
-    DEG(6,2,10) = 0
-  COEF(6,2) = (-0.4069835646127759, 0)
-    DEG(6,3,1) = 0
-    DEG(6,3,2) = 2
-    DEG(6,3,3) = 0
-    DEG(6,3,4) = 0
-    DEG(6,3,5) = 0
-    DEG(6,3,6) = 0
-    DEG(6,3,7) = 0
-    DEG(6,3,8) = 0
-    DEG(6,3,9) = 0
-    DEG(6,3,10) = 0
-  COEF(6,3) = (0.2822661867004282, 0)
-    DEG(6,4,1) = 1
-    DEG(6,4,2) = 0
-    DEG(6,4,3) = 1
-    DEG(6,4,4) = 0
-    DEG(6,4,5) = 0
-    DEG(6,4,6) = 0
-    DEG(6,4,7) = 0
-    DEG(6,4,8) = 0
-    DEG(6,4,9) = 0
-    DEG(6,4,10) = 0
-  COEF(6,4) = (0.8451107786883508, 0)
-    DEG(6,5,1) = 0
-    DEG(6,5,2) = 1
-    DEG(6,5,3) = 1
-    DEG(6,5,4) = 0
-    DEG(6,5,5) = 0
-    DEG(6,5,6) = 0
-    DEG(6,5,7) = 0
-    DEG(6,5,8) = 0
-    DEG(6,5,9) = 0
-    DEG(6,5,10) = 0
-  COEF(6,5) = (-0.5316708978452792, 0)
-    DEG(6,6,1) = 0
-    DEG(6,6,2) = 0
-    DEG(6,6,3) = 2
-    DEG(6,6,4) = 0
-    DEG(6,6,5) = 0
-    DEG(6,6,6) = 0
-    DEG(6,6,7) = 0
-    DEG(6,6,8) = 0
-    DEG(6,6,9) = 0
-    DEG(6,6,10) = 0
-  COEF(6,6) = (-0.8798108963881374, 0)
-    DEG(6,7,1) = 2
-    DEG(6,7,2) = 0
-    DEG(6,7,3) = 0
-    DEG(6,7,4) = 1
-    DEG(6,7,5) = 0
-    DEG(6,7,6) = 0
-    DEG(6,7,7) = 0
-    DEG(6,7,8) = 0
-    DEG(6,7,9) = 0
-    DEG(6,7,10) = 0
-  COEF(6,7) = (-0.08841286657967666, 0)
-    DEG(6,8,1) = 1
-    DEG(6,8,2) = 1
-    DEG(6,8,3) = 0
-    DEG(6,8,4) = 1
-    DEG(6,8,5) = 0
-    DEG(6,8,6) = 0
-    DEG(6,8,7) = 0
-    DEG(6,8,8) = 0
-    DEG(6,8,9) = 0
-    DEG(6,8,10) = 0
-  COEF(6,8) = (-0.5437440767827946, 0)
-    DEG(6,9,1) = 0
-    DEG(6,9,2) = 2
-    DEG(6,9,3) = 0
-    DEG(6,9,4) = 1
-    DEG(6,9,5) = 0
-    DEG(6,9,6) = 0
-    DEG(6,9,7) = 0
-    DEG(6,9,8) = 0
-    DEG(6,9,9) = 0
-    DEG(6,9,10) = 0
-  COEF(6,9) = (0.8310187547943032, 0)
-    DEG(6,10,1) = 1
-    DEG(6,10,2) = 0
-    DEG(6,10,3) = 1
-    DEG(6,10,4) = 1
-    DEG(6,10,5) = 0
-    DEG(6,10,6) = 0
-    DEG(6,10,7) = 0
-    DEG(6,10,8) = 0
-    DEG(6,10,9) = 0
-    DEG(6,10,10) = 0
-  COEF(6,10) = (-2.300828301805621, 0)
-    DEG(6,11,1) = 0
-    DEG(6,11,2) = 1
-    DEG(6,11,3) = 1
-    DEG(6,11,4) = 1
-    DEG(6,11,5) = 0
-    DEG(6,11,6) = 0
-    DEG(6,11,7) = 0
-    DEG(6,11,8) = 0
-    DEG(6,11,9) = 0
-    DEG(6,11,10) = 0
-  COEF(6,11) = (1.7576212044508612, 0)
-    DEG(6,12,1) = 0
-    DEG(6,12,2) = 0
-    DEG(6,12,3) = 2
-    DEG(6,12,4) = 1
-    DEG(6,12,5) = 0
-    DEG(6,12,6) = 0
-    DEG(6,12,7) = 0
-    DEG(6,12,8) = 0
-    DEG(6,12,9) = 0
-    DEG(6,12,10) = 0
-  COEF(6,12) = (0.8123567734335738, 0)
-    DEG(6,13,1) = 2
-    DEG(6,13,2) = 0
-    DEG(6,13,3) = 0
-    DEG(6,13,4) = 2
-    DEG(6,13,5) = 0
-    DEG(6,13,6) = 0
-    DEG(6,13,7) = 0
-    DEG(6,13,8) = 0
-    DEG(6,13,9) = 0
-    DEG(6,13,10) = 0
-  COEF(6,13) = (-0.06820768665581543, 0)
-    DEG(6,14,1) = 1
-    DEG(6,14,2) = 1
-    DEG(6,14,3) = 0
-    DEG(6,14,4) = 2
-    DEG(6,14,5) = 0
-    DEG(6,14,6) = 0
-    DEG(6,14,7) = 0
-    DEG(6,14,8) = 0
-    DEG(6,14,9) = 0
-    DEG(6,14,10) = 0
-  COEF(6,14) = (1.3043060864108098, 0)
-    DEG(6,15,1) = 0
-    DEG(6,15,2) = 2
-    DEG(6,15,3) = 0
-    DEG(6,15,4) = 2
-    DEG(6,15,5) = 0
-    DEG(6,15,6) = 0
-    DEG(6,15,7) = 0
-    DEG(6,15,8) = 0
-    DEG(6,15,9) = 0
-    DEG(6,15,10) = 0
-  COEF(6,15) = (-0.009054065062096384, 0)
-    DEG(6,16,1) = 1
-    DEG(6,16,2) = 0
-    DEG(6,16,3) = 1
-    DEG(6,16,4) = 2
-    DEG(6,16,5) = 0
-    DEG(6,16,6) = 0
-    DEG(6,16,7) = 0
-    DEG(6,16,8) = 0
-    DEG(6,16,9) = 0
-    DEG(6,16,10) = 0
-  COEF(6,16) = (1.3077574118576432, 0)
-    DEG(6,17,1) = 0
-    DEG(6,17,2) = 1
-    DEG(6,17,3) = 1
-    DEG(6,17,4) = 2
-    DEG(6,17,5) = 0
-    DEG(6,17,6) = 0
-    DEG(6,17,7) = 0
-    DEG(6,17,8) = 0
-    DEG(6,17,9) = 0
-    DEG(6,17,10) = 0
-  COEF(6,17) = (0.06768474224643237, 0)
-    DEG(6,18,1) = 0
-    DEG(6,18,2) = 0
-    DEG(6,18,3) = 2
-    DEG(6,18,4) = 2
-    DEG(6,18,5) = 0
-    DEG(6,18,6) = 0
-    DEG(6,18,7) = 0
-    DEG(6,18,8) = 0
-    DEG(6,18,9) = 0
-    DEG(6,18,10) = 0
-  COEF(6,18) = (0.07726175171791182, 0)
-    DEG(6,19,1) = 2
-    DEG(6,19,2) = 0
-    DEG(6,19,3) = 0
-    DEG(6,19,4) = 0
-    DEG(6,19,5) = 1
-    DEG(6,19,6) = 0
-    DEG(6,19,7) = 0
-    DEG(6,19,8) = 0
-    DEG(6,19,9) = 0
-    DEG(6,19,10) = 0
-  COEF(6,19) = (0.21964796928975452, 0)
-    DEG(6,20,1) = 1
-    DEG(6,20,2) = 1
-    DEG(6,20,3) = 0
-    DEG(6,20,4) = 0
-    DEG(6,20,5) = 1
-    DEG(6,20,6) = 0
-    DEG(6,20,7) = 0
-    DEG(6,20,8) = 0
-    DEG(6,20,9) = 0
-    DEG(6,20,10) = 0
-  COEF(6,20) = (-0.7213869971382741, 0)
-    DEG(6,21,1) = 0
-    DEG(6,21,2) = 2
-    DEG(6,21,3) = 0
-    DEG(6,21,4) = 0
-    DEG(6,21,5) = 1
-    DEG(6,21,6) = 0
-    DEG(6,21,7) = 0
-    DEG(6,21,8) = 0
-    DEG(6,21,9) = 0
-    DEG(6,21,10) = 0
-  COEF(6,21) = (0.06428880062023586, 0)
-    DEG(6,22,1) = 1
-    DEG(6,22,2) = 0
-    DEG(6,22,3) = 1
-    DEG(6,22,4) = 0
-    DEG(6,22,5) = 1
-    DEG(6,22,6) = 0
-    DEG(6,22,7) = 0
-    DEG(6,22,8) = 0
-    DEG(6,22,9) = 0
-    DEG(6,22,10) = 0
-  COEF(6,22) = (0.6769693907722261, 0)
-    DEG(6,23,1) = 0
-    DEG(6,23,2) = 1
-    DEG(6,23,3) = 1
-    DEG(6,23,4) = 0
-    DEG(6,23,5) = 1
-    DEG(6,23,6) = 0
-    DEG(6,23,7) = 0
-    DEG(6,23,8) = 0
-    DEG(6,23,9) = 0
-    DEG(6,23,10) = 0
-  COEF(6,23) = (1.0938889186830445, 0)
-    DEG(6,24,1) = 0
-    DEG(6,24,2) = 0
-    DEG(6,24,3) = 2
-    DEG(6,24,4) = 0
-    DEG(6,24,5) = 1
-    DEG(6,24,6) = 0
-    DEG(6,24,7) = 0
-    DEG(6,24,8) = 0
-    DEG(6,24,9) = 0
-    DEG(6,24,10) = 0
-  COEF(6,24) = (1.033778176369894, 0)
-    DEG(6,25,1) = 2
-    DEG(6,25,2) = 0
-    DEG(6,25,3) = 0
-    DEG(6,25,4) = 1
-    DEG(6,25,5) = 1
-    DEG(6,25,6) = 0
-    DEG(6,25,7) = 0
-    DEG(6,25,8) = 0
-    DEG(6,25,9) = 0
-    DEG(6,25,10) = 0
-  COEF(6,25) = (0.04579106142198317, 0)
-    DEG(6,26,1) = 1
-    DEG(6,26,2) = 1
-    DEG(6,26,3) = 0
-    DEG(6,26,4) = 1
-    DEG(6,26,5) = 1
-    DEG(6,26,6) = 0
-    DEG(6,26,7) = 0
-    DEG(6,26,8) = 0
-    DEG(6,26,9) = 0
-    DEG(6,26,10) = 0
-  COEF(6,26) = (-1.6136177673887118, 0)
-    DEG(6,27,1) = 0
-    DEG(6,27,2) = 2
-    DEG(6,27,3) = 0
-    DEG(6,27,4) = 1
-    DEG(6,27,5) = 1
-    DEG(6,27,6) = 0
-    DEG(6,27,7) = 0
-    DEG(6,27,8) = 0
-    DEG(6,27,9) = 0
-    DEG(6,27,10) = 0
-  COEF(6,27) = (-0.08313705215573315, 0)
-    DEG(6,28,1) = 1
-    DEG(6,28,2) = 0
-    DEG(6,28,3) = 1
-    DEG(6,28,4) = 1
-    DEG(6,28,5) = 1
-    DEG(6,28,6) = 0
-    DEG(6,28,7) = 0
-    DEG(6,28,8) = 0
-    DEG(6,28,9) = 0
-    DEG(6,28,10) = 0
-  COEF(6,28) = (-0.3180870028357637, 0)
-    DEG(6,29,1) = 0
-    DEG(6,29,2) = 1
-    DEG(6,29,3) = 1
-    DEG(6,29,4) = 1
-    DEG(6,29,5) = 1
-    DEG(6,29,6) = 0
-    DEG(6,29,7) = 0
-    DEG(6,29,8) = 0
-    DEG(6,29,9) = 0
-    DEG(6,29,10) = 0
-  COEF(6,29) = (-0.1323253404673372, 0)
-    DEG(6,30,1) = 0
-    DEG(6,30,2) = 0
-    DEG(6,30,3) = 2
-    DEG(6,30,4) = 1
-    DEG(6,30,5) = 1
-    DEG(6,30,6) = 0
-    DEG(6,30,7) = 0
-    DEG(6,30,8) = 0
-    DEG(6,30,9) = 0
-    DEG(6,30,10) = 0
-  COEF(6,30) = (0.03734599073374998, 0)
-    DEG(6,31,1) = 2
-    DEG(6,31,2) = 0
-    DEG(6,31,3) = 0
-    DEG(6,31,4) = 0
-    DEG(6,31,5) = 2
-    DEG(6,31,6) = 0
-    DEG(6,31,7) = 0
-    DEG(6,31,8) = 0
-    DEG(6,31,9) = 0
-    DEG(6,31,10) = 0
-  COEF(6,31) = (0.06270407236710761, 0)
-    DEG(6,32,1) = 1
-    DEG(6,32,2) = 1
-    DEG(6,32,3) = 0
-    DEG(6,32,4) = 0
-    DEG(6,32,5) = 2
-    DEG(6,32,6) = 0
-    DEG(6,32,7) = 0
-    DEG(6,32,8) = 0
-    DEG(6,32,9) = 0
-    DEG(6,32,10) = 0
-  COEF(6,32) = (-0.19162792586107563, 0)
-    DEG(6,33,1) = 0
-    DEG(6,33,2) = 2
-    DEG(6,33,3) = 0
-    DEG(6,33,4) = 0
-    DEG(6,33,5) = 2
-    DEG(6,33,6) = 0
-    DEG(6,33,7) = 0
-    DEG(6,33,8) = 0
-    DEG(6,33,9) = 0
-    DEG(6,33,10) = 0
-  COEF(6,33) = (-0.009068232422623026, 0)
-    DEG(6,34,1) = 1
-    DEG(6,34,2) = 0
-    DEG(6,34,3) = 1
-    DEG(6,34,4) = 0
-    DEG(6,34,5) = 2
-    DEG(6,34,6) = 0
-    DEG(6,34,7) = 0
-    DEG(6,34,8) = 0
-    DEG(6,34,9) = 0
-    DEG(6,34,10) = 0
-  COEF(6,34) = (-1.9648502282295741, 0)
-    DEG(6,35,1) = 0
-    DEG(6,35,2) = 1
-    DEG(6,35,3) = 1
-    DEG(6,35,4) = 0
-    DEG(6,35,5) = 2
-    DEG(6,35,6) = 0
-    DEG(6,35,7) = 0
-    DEG(6,35,8) = 0
-    DEG(6,35,9) = 0
-    DEG(6,35,10) = 0
-  COEF(6,35) = (-0.09696983966017489, 0)
-    DEG(6,36,1) = 0
-    DEG(6,36,2) = 0
-    DEG(6,36,3) = 2
-    DEG(6,36,4) = 0
-    DEG(6,36,5) = 2
-    DEG(6,36,6) = 0
-    DEG(6,36,7) = 0
-    DEG(6,36,8) = 0
-    DEG(6,36,9) = 0
-    DEG(6,36,10) = 0
-  COEF(6,36) = (-0.053635839944484585, 0)
-    DEG(6,37,1) = 2
-    DEG(6,37,2) = 0
-    DEG(6,37,3) = 0
-    DEG(6,37,4) = 0
-    DEG(6,37,5) = 0
-    DEG(6,37,6) = 1
-    DEG(6,37,7) = 0
-    DEG(6,37,8) = 0
-    DEG(6,37,9) = 0
-    DEG(6,37,10) = 0
-  COEF(6,37) = (0.09136896607569936, 0)
-    DEG(6,38,1) = 1
-    DEG(6,38,2) = 1
-    DEG(6,38,3) = 0
-    DEG(6,38,4) = 0
-    DEG(6,38,5) = 0
-    DEG(6,38,6) = 1
-    DEG(6,38,7) = 0
-    DEG(6,38,8) = 0
-    DEG(6,38,9) = 0
-    DEG(6,38,10) = 0
-  COEF(6,38) = (-1.5831271499881143, 0)
-    DEG(6,39,1) = 0
-    DEG(6,39,2) = 2
-    DEG(6,39,3) = 0
-    DEG(6,39,4) = 0
-    DEG(6,39,5) = 0
-    DEG(6,39,6) = 1
-    DEG(6,39,7) = 0
-    DEG(6,39,8) = 0
-    DEG(6,39,9) = 0
-    DEG(6,39,10) = 0
-  COEF(6,39) = (1.1586203238882382, 0)
-    DEG(6,40,1) = 1
-    DEG(6,40,2) = 0
-    DEG(6,40,3) = 1
-    DEG(6,40,4) = 0
-    DEG(6,40,5) = 0
-    DEG(6,40,6) = 1
-    DEG(6,40,7) = 0
-    DEG(6,40,8) = 0
-    DEG(6,40,9) = 0
-    DEG(6,40,10) = 0
-  COEF(6,40) = (1.561944037084699, 0)
-    DEG(6,41,1) = 0
-    DEG(6,41,2) = 1
-    DEG(6,41,3) = 1
-    DEG(6,41,4) = 0
-    DEG(6,41,5) = 0
-    DEG(6,41,6) = 1
-    DEG(6,41,7) = 0
-    DEG(6,41,8) = 0
-    DEG(6,41,9) = 0
-    DEG(6,41,10) = 0
-  COEF(6,41) = (0.5373765622781439, 0)
-    DEG(6,42,1) = 0
-    DEG(6,42,2) = 0
-    DEG(6,42,3) = 2
-    DEG(6,42,4) = 0
-    DEG(6,42,5) = 0
-    DEG(6,42,6) = 1
-    DEG(6,42,7) = 0
-    DEG(6,42,8) = 0
-    DEG(6,42,9) = 0
-    DEG(6,42,10) = 0
-  COEF(6,42) = (-0.7510078085771675, 0)
-    DEG(6,43,1) = 2
-    DEG(6,43,2) = 0
-    DEG(6,43,3) = 0
-    DEG(6,43,4) = 1
-    DEG(6,43,5) = 0
-    DEG(6,43,6) = 1
-    DEG(6,43,7) = 0
-    DEG(6,43,8) = 0
-    DEG(6,43,9) = 0
-    DEG(6,43,10) = 0
-  COEF(6,43) = (0.03313601431114031, 0)
-    DEG(6,44,1) = 1
-    DEG(6,44,2) = 1
-    DEG(6,44,3) = 0
-    DEG(6,44,4) = 1
-    DEG(6,44,5) = 0
-    DEG(6,44,6) = 1
-    DEG(6,44,7) = 0
-    DEG(6,44,8) = 0
-    DEG(6,44,9) = 0
-    DEG(6,44,10) = 0
-  COEF(6,44) = (0.999575794109116, 0)
-    DEG(6,45,1) = 0
-    DEG(6,45,2) = 2
-    DEG(6,45,3) = 0
-    DEG(6,45,4) = 1
-    DEG(6,45,5) = 0
-    DEG(6,45,6) = 1
-    DEG(6,45,7) = 0
-    DEG(6,45,8) = 0
-    DEG(6,45,9) = 0
-    DEG(6,45,10) = 0
-  COEF(6,45) = (0.0005673645755714211, 0)
-    DEG(6,46,1) = 1
-    DEG(6,46,2) = 0
-    DEG(6,46,3) = 1
-    DEG(6,46,4) = 1
-    DEG(6,46,5) = 0
-    DEG(6,46,6) = 1
-    DEG(6,46,7) = 0
-    DEG(6,46,8) = 0
-    DEG(6,46,9) = 0
-    DEG(6,46,10) = 0
-  COEF(6,46) = (-1.8768450822200746, 0)
-    DEG(6,47,1) = 0
-    DEG(6,47,2) = 1
-    DEG(6,47,3) = 1
-    DEG(6,47,4) = 1
-    DEG(6,47,5) = 0
-    DEG(6,47,6) = 1
-    DEG(6,47,7) = 0
-    DEG(6,47,8) = 0
-    DEG(6,47,9) = 0
-    DEG(6,47,10) = 0
-  COEF(6,47) = (0.15574381848783894, 0)
-    DEG(6,48,1) = 0
-    DEG(6,48,2) = 0
-    DEG(6,48,3) = 2
-    DEG(6,48,4) = 1
-    DEG(6,48,5) = 0
-    DEG(6,48,6) = 1
-    DEG(6,48,7) = 0
-    DEG(6,48,8) = 0
-    DEG(6,48,9) = 0
-    DEG(6,48,10) = 0
-  COEF(6,48) = (-0.03370337888671173, 0)
-    DEG(6,49,1) = 2
-    DEG(6,49,2) = 0
-    DEG(6,49,3) = 0
-    DEG(6,49,4) = 0
-    DEG(6,49,5) = 1
-    DEG(6,49,6) = 1
-    DEG(6,49,7) = 0
-    DEG(6,49,8) = 0
-    DEG(6,49,9) = 0
-    DEG(6,49,10) = 0
-  COEF(6,49) = (0.040671941002624216, 0)
-    DEG(6,50,1) = 1
-    DEG(6,50,2) = 1
-    DEG(6,50,3) = 0
-    DEG(6,50,4) = 0
-    DEG(6,50,5) = 1
-    DEG(6,50,6) = 1
-    DEG(6,50,7) = 0
-    DEG(6,50,8) = 0
-    DEG(6,50,9) = 0
-    DEG(6,50,10) = 0
-  COEF(6,50) = (-2.5271478321380254, 0)
-    DEG(6,51,1) = 0
-    DEG(6,51,2) = 2
-    DEG(6,51,3) = 0
-    DEG(6,51,4) = 0
-    DEG(6,51,5) = 1
-    DEG(6,51,6) = 1
-    DEG(6,51,7) = 0
-    DEG(6,51,8) = 0
-    DEG(6,51,9) = 0
-    DEG(6,51,10) = 0
-  COEF(6,51) = (-0.11221443152128503, 0)
-    DEG(6,52,1) = 1
-    DEG(6,52,2) = 0
-    DEG(6,52,3) = 1
-    DEG(6,52,4) = 0
-    DEG(6,52,5) = 1
-    DEG(6,52,6) = 1
-    DEG(6,52,7) = 0
-    DEG(6,52,8) = 0
-    DEG(6,52,9) = 0
-    DEG(6,52,10) = 0
-  COEF(6,52) = (0.5426249873354888, 0)
-    DEG(6,53,1) = 0
-    DEG(6,53,2) = 1
-    DEG(6,53,3) = 1
-    DEG(6,53,4) = 0
-    DEG(6,53,5) = 1
-    DEG(6,53,6) = 1
-    DEG(6,53,7) = 0
-    DEG(6,53,8) = 0
-    DEG(6,53,9) = 0
-    DEG(6,53,10) = 0
-  COEF(6,53) = (0.01844664972668835, 0)
-    DEG(6,54,1) = 0
-    DEG(6,54,2) = 0
-    DEG(6,54,3) = 2
-    DEG(6,54,4) = 0
-    DEG(6,54,5) = 1
-    DEG(6,54,6) = 1
-    DEG(6,54,7) = 0
-    DEG(6,54,8) = 0
-    DEG(6,54,9) = 0
-    DEG(6,54,10) = 0
-  COEF(6,54) = (0.07154249051866082, 0)
-    DEG(6,55,1) = 2
-    DEG(6,55,2) = 0
-    DEG(6,55,3) = 0
-    DEG(6,55,4) = 0
-    DEG(6,55,5) = 0
-    DEG(6,55,6) = 2
-    DEG(6,55,7) = 0
-    DEG(6,55,8) = 0
-    DEG(6,55,9) = 0
-    DEG(6,55,10) = 0
-  COEF(6,55) = (0.005503614288707821, 0)
-    DEG(6,56,1) = 1
-    DEG(6,56,2) = 1
-    DEG(6,56,3) = 0
-    DEG(6,56,4) = 0
-    DEG(6,56,5) = 0
-    DEG(6,56,6) = 2
-    DEG(6,56,7) = 0
-    DEG(6,56,8) = 0
-    DEG(6,56,9) = 0
-    DEG(6,56,10) = 0
-  COEF(6,56) = (-1.1126781605497342, 0)
-    DEG(6,57,1) = 0
-    DEG(6,57,2) = 2
-    DEG(6,57,3) = 0
-    DEG(6,57,4) = 0
-    DEG(6,57,5) = 0
-    DEG(6,57,6) = 2
-    DEG(6,57,7) = 0
-    DEG(6,57,8) = 0
-    DEG(6,57,9) = 0
-    DEG(6,57,10) = 0
-  COEF(6,57) = (0.01812229748471941, 0)
-    DEG(6,58,1) = 1
-    DEG(6,58,2) = 0
-    DEG(6,58,3) = 1
-    DEG(6,58,4) = 0
-    DEG(6,58,5) = 0
-    DEG(6,58,6) = 2
-    DEG(6,58,7) = 0
-    DEG(6,58,8) = 0
-    DEG(6,58,9) = 0
-    DEG(6,58,10) = 0
-  COEF(6,58) = (0.657092816371931, 0)
-    DEG(6,59,1) = 0
-    DEG(6,59,2) = 1
-    DEG(6,59,3) = 1
-    DEG(6,59,4) = 0
-    DEG(6,59,5) = 0
-    DEG(6,59,6) = 2
-    DEG(6,59,7) = 0
-    DEG(6,59,8) = 0
-    DEG(6,59,9) = 0
-    DEG(6,59,10) = 0
-  COEF(6,59) = (0.029285097413742515, 0)
-    DEG(6,60,1) = 0
-    DEG(6,60,2) = 0
-    DEG(6,60,3) = 2
-    DEG(6,60,4) = 0
-    DEG(6,60,5) = 0
-    DEG(6,60,6) = 2
-    DEG(6,60,7) = 0
-    DEG(6,60,8) = 0
-    DEG(6,60,9) = 0
-    DEG(6,60,10) = 0
-  COEF(6,60) = (-0.02362591177342723, 0)
-    DEG(6,61,1) = 0
-    DEG(6,61,2) = 0
-    DEG(6,61,3) = 0
-    DEG(6,61,4) = 0
-    DEG(6,61,5) = 0
-    DEG(6,61,6) = 0
-    DEG(6,61,7) = 1
-    DEG(6,61,8) = 0
-    DEG(6,61,9) = 0
-    DEG(6,61,10) = 0
-  COEF(6,61) = (0.49802078883164164, 0)
-    DEG(6,62,1) = 0
-    DEG(6,62,2) = 0
-    DEG(6,62,3) = 0
-    DEG(6,62,4) = 1
-    DEG(6,62,5) = 0
-    DEG(6,62,6) = 0
-    DEG(6,62,7) = 1
-    DEG(6,62,8) = 0
-    DEG(6,62,9) = 0
-    DEG(6,62,10) = 0
-  COEF(6,62) = (-1.5549626616482004, 0)
-    DEG(6,63,1) = 0
-    DEG(6,63,2) = 0
-    DEG(6,63,3) = 0
-    DEG(6,63,4) = 0
-    DEG(6,63,5) = 1
-    DEG(6,63,6) = 0
-    DEG(6,63,7) = 1
-    DEG(6,63,8) = 0
-    DEG(6,63,9) = 0
-    DEG(6,63,10) = 0
-  COEF(6,63) = (-1.3177149462798845, 0)
-    DEG(6,64,1) = 0
-    DEG(6,64,2) = 0
-    DEG(6,64,3) = 0
-    DEG(6,64,4) = 0
-    DEG(6,64,5) = 0
-    DEG(6,64,6) = 1
-    DEG(6,64,7) = 1
-    DEG(6,64,8) = 0
-    DEG(6,64,9) = 0
-    DEG(6,64,10) = 0
-  COEF(6,64) = (-0.49898148138677, 0)
-    DEG(6,65,1) = 0
-    DEG(6,65,2) = 0
-    DEG(6,65,3) = 0
-    DEG(6,65,4) = 0
-    DEG(6,65,5) = 0
-    DEG(6,65,6) = 0
-    DEG(6,65,7) = 0
-    DEG(6,65,8) = 1
-    DEG(6,65,9) = 0
-    DEG(6,65,10) = 0
-  COEF(6,65) = (-0.12338824573791841, 0)
-    DEG(6,66,1) = 0
-    DEG(6,66,2) = 0
-    DEG(6,66,3) = 0
-    DEG(6,66,4) = 1
-    DEG(6,66,5) = 0
-    DEG(6,66,6) = 0
-    DEG(6,66,7) = 0
-    DEG(6,66,8) = 1
-    DEG(6,66,9) = 0
-    DEG(6,66,10) = 0
-  COEF(6,66) = (-0.06111510706623446, 0)
-    DEG(6,67,1) = 0
-    DEG(6,67,2) = 0
-    DEG(6,67,3) = 0
-    DEG(6,67,4) = 0
-    DEG(6,67,5) = 1
-    DEG(6,67,6) = 0
-    DEG(6,67,7) = 0
-    DEG(6,67,8) = 1
-    DEG(6,67,9) = 0
-    DEG(6,67,10) = 0
-  COEF(6,67) = (-0.04157014428073322, 0)
-    DEG(6,68,1) = 0
-    DEG(6,68,2) = 0
-    DEG(6,68,3) = 0
-    DEG(6,68,4) = 0
-    DEG(6,68,5) = 0
-    DEG(6,68,6) = 1
-    DEG(6,68,7) = 0
-    DEG(6,68,8) = 1
-    DEG(6,68,9) = 0
-    DEG(6,68,10) = 0
-  COEF(6,68) = (-0.007996832327295606, 0)
-    DEG(6,69,1) = 0
-    DEG(6,69,2) = 0
-    DEG(6,69,3) = 0
-    DEG(6,69,4) = 0
-    DEG(6,69,5) = 0
-    DEG(6,69,6) = 0
-    DEG(6,69,7) = 0
-    DEG(6,69,8) = 0
-    DEG(6,69,9) = 1
-    DEG(6,69,10) = 0
-  COEF(6,69) = (0.3953545453627241, 0)
-    DEG(6,70,1) = 0
-    DEG(6,70,2) = 0
-    DEG(6,70,3) = 0
-    DEG(6,70,4) = 1
-    DEG(6,70,5) = 0
-    DEG(6,70,6) = 0
-    DEG(6,70,7) = 0
-    DEG(6,70,8) = 0
-    DEG(6,70,9) = 1
-    DEG(6,70,10) = 0
-  COEF(6,70) = (1.168253359907005, 0)
-    DEG(6,71,1) = 0
-    DEG(6,71,2) = 0
-    DEG(6,71,3) = 0
-    DEG(6,71,4) = 0
-    DEG(6,71,5) = 1
-    DEG(6,71,6) = 0
-    DEG(6,71,7) = 0
-    DEG(6,71,8) = 0
-    DEG(6,71,9) = 1
-    DEG(6,71,10) = 0
-  COEF(6,71) = (0.1289788318383644, 0)
-    DEG(6,72,1) = 0
-    DEG(6,72,2) = 0
-    DEG(6,72,3) = 0
-    DEG(6,72,4) = 0
-    DEG(6,72,5) = 0
-    DEG(6,72,6) = 1
-    DEG(6,72,7) = 0
-    DEG(6,72,8) = 0
-    DEG(6,72,9) = 1
-    DEG(6,72,10) = 0
-  COEF(6,72) = (1.6166074402033737, 0)
-    DEG(6,73,1) = 0
-    DEG(6,73,2) = 0
-    DEG(6,73,3) = 0
-    DEG(6,73,4) = 0
-    DEG(6,73,5) = 0
-    DEG(6,73,6) = 0
-    DEG(6,73,7) = 0
-    DEG(6,73,8) = 0
-    DEG(6,73,9) = 0
-    DEG(6,73,10) = 1
-  COEF(6,73) = (-1.1634376524391858, 0)
-    DEG(6,74,1) = 0
-    DEG(6,74,2) = 0
-    DEG(6,74,3) = 0
-    DEG(6,74,4) = 1
-    DEG(6,74,5) = 0
-    DEG(6,74,6) = 0
-    DEG(6,74,7) = 0
-    DEG(6,74,8) = 0
-    DEG(6,74,9) = 0
-    DEG(6,74,10) = 1
-  COEF(6,74) = (1.1753697910765462, 0)
-    DEG(6,75,1) = 0
-    DEG(6,75,2) = 0
-    DEG(6,75,3) = 0
-    DEG(6,75,4) = 0
-    DEG(6,75,5) = 1
-    DEG(6,75,6) = 0
-    DEG(6,75,7) = 0
-    DEG(6,75,8) = 0
-    DEG(6,75,9) = 0
-    DEG(6,75,10) = 1
-  COEF(6,75) = (1.303746265623441, 0)
-    DEG(6,76,1) = 0
-    DEG(6,76,2) = 0
-    DEG(6,76,3) = 0
-    DEG(6,76,4) = 0
-    DEG(6,76,5) = 0
-    DEG(6,76,6) = 1
-    DEG(6,76,7) = 0
-    DEG(6,76,8) = 0
-    DEG(6,76,9) = 0
-    DEG(6,76,10) = 1
-  COEF(6,76) = (-0.9550529463247988, 0)
-
-NUM_TERMS(7) = 76
-    DEG(7,1,1) = 2
-    DEG(7,1,2) = 0
-    DEG(7,1,3) = 0
-    DEG(7,1,4) = 0
-    DEG(7,1,5) = 0
-    DEG(7,1,6) = 0
-    DEG(7,1,7) = 0
-    DEG(7,1,8) = 0
-    DEG(7,1,9) = 0
-    DEG(7,1,10) = 0
-  COEF(7,1) = (-0.43946259392041137, 0)
-    DEG(7,2,1) = 1
-    DEG(7,2,2) = 1
-    DEG(7,2,3) = 0
-    DEG(7,2,4) = 0
-    DEG(7,2,5) = 0
-    DEG(7,2,6) = 0
-    DEG(7,2,7) = 0
-    DEG(7,2,8) = 0
-    DEG(7,2,9) = 0
-    DEG(7,2,10) = 0
-  COEF(7,2) = (-0.2794194400312886, 0)
-    DEG(7,3,1) = 0
-    DEG(7,3,2) = 2
-    DEG(7,3,3) = 0
-    DEG(7,3,4) = 0
-    DEG(7,3,5) = 0
-    DEG(7,3,6) = 0
-    DEG(7,3,7) = 0
-    DEG(7,3,8) = 0
-    DEG(7,3,9) = 0
-    DEG(7,3,10) = 0
-  COEF(7,3) = (0.28633513817241923, 0)
-    DEG(7,4,1) = 1
-    DEG(7,4,2) = 0
-    DEG(7,4,3) = 1
-    DEG(7,4,4) = 0
-    DEG(7,4,5) = 0
-    DEG(7,4,6) = 0
-    DEG(7,4,7) = 0
-    DEG(7,4,8) = 0
-    DEG(7,4,9) = 0
-    DEG(7,4,10) = 0
-  COEF(7,4) = (0.4837842932289669, 0)
-    DEG(7,5,1) = 0
-    DEG(7,5,2) = 1
-    DEG(7,5,3) = 1
-    DEG(7,5,4) = 0
-    DEG(7,5,5) = 0
-    DEG(7,5,6) = 0
-    DEG(7,5,7) = 0
-    DEG(7,5,8) = 0
-    DEG(7,5,9) = 0
-    DEG(7,5,10) = 0
-  COEF(7,5) = (-0.2789447622513483, 0)
-    DEG(7,6,1) = 0
-    DEG(7,6,2) = 0
-    DEG(7,6,3) = 2
-    DEG(7,6,4) = 0
-    DEG(7,6,5) = 0
-    DEG(7,6,6) = 0
-    DEG(7,6,7) = 0
-    DEG(7,6,8) = 0
-    DEG(7,6,9) = 0
-    DEG(7,6,10) = 0
-  COEF(7,6) = (0.00840391192868436, 0)
-    DEG(7,7,1) = 2
-    DEG(7,7,2) = 0
-    DEG(7,7,3) = 0
-    DEG(7,7,4) = 1
-    DEG(7,7,5) = 0
-    DEG(7,7,6) = 0
-    DEG(7,7,7) = 0
-    DEG(7,7,8) = 0
-    DEG(7,7,9) = 0
-    DEG(7,7,10) = 0
-  COEF(7,7) = (-1.5744202005495247, 0)
-    DEG(7,8,1) = 1
-    DEG(7,8,2) = 1
-    DEG(7,8,3) = 0
-    DEG(7,8,4) = 1
-    DEG(7,8,5) = 0
-    DEG(7,8,6) = 0
-    DEG(7,8,7) = 0
-    DEG(7,8,8) = 0
-    DEG(7,8,9) = 0
-    DEG(7,8,10) = 0
-  COEF(7,8) = (-0.2861663506179279, 0)
-    DEG(7,9,1) = 0
-    DEG(7,9,2) = 2
-    DEG(7,9,3) = 0
-    DEG(7,9,4) = 1
-    DEG(7,9,5) = 0
-    DEG(7,9,6) = 0
-    DEG(7,9,7) = 0
-    DEG(7,9,8) = 0
-    DEG(7,9,9) = 0
-    DEG(7,9,10) = 0
-  COEF(7,9) = (0.7386941869051702, 0)
-    DEG(7,10,1) = 1
-    DEG(7,10,2) = 0
-    DEG(7,10,3) = 1
-    DEG(7,10,4) = 1
-    DEG(7,10,5) = 0
-    DEG(7,10,6) = 0
-    DEG(7,10,7) = 0
-    DEG(7,10,8) = 0
-    DEG(7,10,9) = 0
-    DEG(7,10,10) = 0
-  COEF(7,10) = (0.5331769017373268, 0)
-    DEG(7,11,1) = 0
-    DEG(7,11,2) = 1
-    DEG(7,11,3) = 1
-    DEG(7,11,4) = 1
-    DEG(7,11,5) = 0
-    DEG(7,11,6) = 0
-    DEG(7,11,7) = 0
-    DEG(7,11,8) = 0
-    DEG(7,11,9) = 0
-    DEG(7,11,10) = 0
-  COEF(7,11) = (0.3754313238644043, 0)
-    DEG(7,12,1) = 0
-    DEG(7,12,2) = 0
-    DEG(7,12,3) = 2
-    DEG(7,12,4) = 1
-    DEG(7,12,5) = 0
-    DEG(7,12,6) = 0
-    DEG(7,12,7) = 0
-    DEG(7,12,8) = 0
-    DEG(7,12,9) = 0
-    DEG(7,12,10) = 0
-  COEF(7,12) = (-0.49557272342979514, 0)
-    DEG(7,13,1) = 2
-    DEG(7,13,2) = 0
-    DEG(7,13,3) = 0
-    DEG(7,13,4) = 2
-    DEG(7,13,5) = 0
-    DEG(7,13,6) = 0
-    DEG(7,13,7) = 0
-    DEG(7,13,8) = 0
-    DEG(7,13,9) = 0
-    DEG(7,13,10) = 0
-  COEF(7,13) = (-0.1697121445535322, 0)
-    DEG(7,14,1) = 1
-    DEG(7,14,2) = 1
-    DEG(7,14,3) = 0
-    DEG(7,14,4) = 2
-    DEG(7,14,5) = 0
-    DEG(7,14,6) = 0
-    DEG(7,14,7) = 0
-    DEG(7,14,8) = 0
-    DEG(7,14,9) = 0
-    DEG(7,14,10) = 0
-  COEF(7,14) = (0.17649121044520624, 0)
-    DEG(7,15,1) = 0
-    DEG(7,15,2) = 2
-    DEG(7,15,3) = 0
-    DEG(7,15,4) = 2
-    DEG(7,15,5) = 0
-    DEG(7,15,6) = 0
-    DEG(7,15,7) = 0
-    DEG(7,15,8) = 0
-    DEG(7,15,9) = 0
-    DEG(7,15,10) = 0
-  COEF(7,15) = (0.230772384999563, 0)
-    DEG(7,16,1) = 1
-    DEG(7,16,2) = 0
-    DEG(7,16,3) = 1
-    DEG(7,16,4) = 2
-    DEG(7,16,5) = 0
-    DEG(7,16,6) = 0
-    DEG(7,16,7) = 0
-    DEG(7,16,8) = 0
-    DEG(7,16,9) = 0
-    DEG(7,16,10) = 0
-  COEF(7,16) = (1.5487222154552227, 0)
-    DEG(7,17,1) = 0
-    DEG(7,17,2) = 1
-    DEG(7,17,3) = 1
-    DEG(7,17,4) = 2
-    DEG(7,17,5) = 0
-    DEG(7,17,6) = 0
-    DEG(7,17,7) = 0
-    DEG(7,17,8) = 0
-    DEG(7,17,9) = 0
-    DEG(7,17,10) = 0
-  COEF(7,17) = (1.1549190062177301, 0)
-    DEG(7,18,1) = 0
-    DEG(7,18,2) = 0
-    DEG(7,18,3) = 2
-    DEG(7,18,4) = 2
-    DEG(7,18,5) = 0
-    DEG(7,18,6) = 0
-    DEG(7,18,7) = 0
-    DEG(7,18,8) = 0
-    DEG(7,18,9) = 0
-    DEG(7,18,10) = 0
-  COEF(7,18) = (-0.061060240446030825, 0)
-    DEG(7,19,1) = 2
-    DEG(7,19,2) = 0
-    DEG(7,19,3) = 0
-    DEG(7,19,4) = 0
-    DEG(7,19,5) = 1
-    DEG(7,19,6) = 0
-    DEG(7,19,7) = 0
-    DEG(7,19,8) = 0
-    DEG(7,19,9) = 0
-    DEG(7,19,10) = 0
-  COEF(7,19) = (0.3428887153466959, 0)
-    DEG(7,20,1) = 1
-    DEG(7,20,2) = 1
-    DEG(7,20,3) = 0
-    DEG(7,20,4) = 0
-    DEG(7,20,5) = 1
-    DEG(7,20,6) = 0
-    DEG(7,20,7) = 0
-    DEG(7,20,8) = 0
-    DEG(7,20,9) = 0
-    DEG(7,20,10) = 0
-  COEF(7,20) = (-2.0520172954900926, 0)
-    DEG(7,21,1) = 0
-    DEG(7,21,2) = 2
-    DEG(7,21,3) = 0
-    DEG(7,21,4) = 0
-    DEG(7,21,5) = 1
-    DEG(7,21,6) = 0
-    DEG(7,21,7) = 0
-    DEG(7,21,8) = 0
-    DEG(7,21,9) = 0
-    DEG(7,21,10) = 0
-  COEF(7,21) = (0.2548434377395737, 0)
-    DEG(7,22,1) = 1
-    DEG(7,22,2) = 0
-    DEG(7,22,3) = 1
-    DEG(7,22,4) = 0
-    DEG(7,22,5) = 1
-    DEG(7,22,6) = 0
-    DEG(7,22,7) = 0
-    DEG(7,22,8) = 0
-    DEG(7,22,9) = 0
-    DEG(7,22,10) = 0
-  COEF(7,22) = (-1.1661156986017325, 0)
-    DEG(7,23,1) = 0
-    DEG(7,23,2) = 1
-    DEG(7,23,3) = 1
-    DEG(7,23,4) = 0
-    DEG(7,23,5) = 1
-    DEG(7,23,6) = 0
-    DEG(7,23,7) = 0
-    DEG(7,23,8) = 0
-    DEG(7,23,9) = 0
-    DEG(7,23,10) = 0
-  COEF(7,23) = (1.1418016311188108, 0)
-    DEG(7,24,1) = 0
-    DEG(7,24,2) = 0
-    DEG(7,24,3) = 2
-    DEG(7,24,4) = 0
-    DEG(7,24,5) = 1
-    DEG(7,24,6) = 0
-    DEG(7,24,7) = 0
-    DEG(7,24,8) = 0
-    DEG(7,24,9) = 0
-    DEG(7,24,10) = 0
-  COEF(7,24) = (-0.03717326023724154, 0)
-    DEG(7,25,1) = 2
-    DEG(7,25,2) = 0
-    DEG(7,25,3) = 0
-    DEG(7,25,4) = 1
-    DEG(7,25,5) = 1
-    DEG(7,25,6) = 0
-    DEG(7,25,7) = 0
-    DEG(7,25,8) = 0
-    DEG(7,25,9) = 0
-    DEG(7,25,10) = 0
-  COEF(7,25) = (-1.1298456541690676, 0)
-    DEG(7,26,1) = 1
-    DEG(7,26,2) = 1
-    DEG(7,26,3) = 0
-    DEG(7,26,4) = 1
-    DEG(7,26,5) = 1
-    DEG(7,26,6) = 0
-    DEG(7,26,7) = 0
-    DEG(7,26,8) = 0
-    DEG(7,26,9) = 0
-    DEG(7,26,10) = 0
-  COEF(7,26) = (-2.0395244570443807, 0)
-    DEG(7,27,1) = 0
-    DEG(7,27,2) = 2
-    DEG(7,27,3) = 0
-    DEG(7,27,4) = 1
-    DEG(7,27,5) = 1
-    DEG(7,27,6) = 0
-    DEG(7,27,7) = 0
-    DEG(7,27,8) = 0
-    DEG(7,27,9) = 0
-    DEG(7,27,10) = 0
-  COEF(7,27) = (-0.46158802071478294, 0)
-    DEG(7,28,1) = 1
-    DEG(7,28,2) = 0
-    DEG(7,28,3) = 1
-    DEG(7,28,4) = 1
-    DEG(7,28,5) = 1
-    DEG(7,28,6) = 0
-    DEG(7,28,7) = 0
-    DEG(7,28,8) = 0
-    DEG(7,28,9) = 0
-    DEG(7,28,10) = 0
-  COEF(7,28) = (-0.7937227851031279, 0)
-    DEG(7,29,1) = 0
-    DEG(7,29,2) = 1
-    DEG(7,29,3) = 1
-    DEG(7,29,4) = 1
-    DEG(7,29,5) = 1
-    DEG(7,29,6) = 0
-    DEG(7,29,7) = 0
-    DEG(7,29,8) = 0
-    DEG(7,29,9) = 0
-    DEG(7,29,10) = 0
-  COEF(7,29) = (1.3925863980743391, 0)
-    DEG(7,30,1) = 0
-    DEG(7,30,2) = 0
-    DEG(7,30,3) = 2
-    DEG(7,30,4) = 1
-    DEG(7,30,5) = 1
-    DEG(7,30,6) = 0
-    DEG(7,30,7) = 0
-    DEG(7,30,8) = 0
-    DEG(7,30,9) = 0
-    DEG(7,30,10) = 0
-  COEF(7,30) = (1.5914336748838505, 0)
-    DEG(7,31,1) = 2
-    DEG(7,31,2) = 0
-    DEG(7,31,3) = 0
-    DEG(7,31,4) = 0
-    DEG(7,31,5) = 2
-    DEG(7,31,6) = 0
-    DEG(7,31,7) = 0
-    DEG(7,31,8) = 0
-    DEG(7,31,9) = 0
-    DEG(7,31,10) = 0
-  COEF(7,31) = (0.5461657368466324, 0)
-    DEG(7,32,1) = 1
-    DEG(7,32,2) = 1
-    DEG(7,32,3) = 0
-    DEG(7,32,4) = 0
-    DEG(7,32,5) = 2
-    DEG(7,32,6) = 0
-    DEG(7,32,7) = 0
-    DEG(7,32,8) = 0
-    DEG(7,32,9) = 0
-    DEG(7,32,10) = 0
-  COEF(7,32) = (-0.40076456254394, 0)
-    DEG(7,33,1) = 0
-    DEG(7,33,2) = 2
-    DEG(7,33,3) = 0
-    DEG(7,33,4) = 0
-    DEG(7,33,5) = 2
-    DEG(7,33,6) = 0
-    DEG(7,33,7) = 0
-    DEG(7,33,8) = 0
-    DEG(7,33,9) = 0
-    DEG(7,33,10) = 0
-  COEF(7,33) = (-0.5789448963236655, 0)
-    DEG(7,34,1) = 1
-    DEG(7,34,2) = 0
-    DEG(7,34,3) = 1
-    DEG(7,34,4) = 0
-    DEG(7,34,5) = 2
-    DEG(7,34,6) = 0
-    DEG(7,34,7) = 0
-    DEG(7,34,8) = 0
-    DEG(7,34,9) = 0
-    DEG(7,34,10) = 0
-  COEF(7,34) = (-1.2606913391501393, 0)
-    DEG(7,35,1) = 0
-    DEG(7,35,2) = 1
-    DEG(7,35,3) = 1
-    DEG(7,35,4) = 0
-    DEG(7,35,5) = 2
-    DEG(7,35,6) = 0
-    DEG(7,35,7) = 0
-    DEG(7,35,8) = 0
-    DEG(7,35,9) = 0
-    DEG(7,35,10) = 0
-  COEF(7,35) = (-0.8839870841626388, 0)
-    DEG(7,36,1) = 0
-    DEG(7,36,2) = 0
-    DEG(7,36,3) = 2
-    DEG(7,36,4) = 0
-    DEG(7,36,5) = 2
-    DEG(7,36,6) = 0
-    DEG(7,36,7) = 0
-    DEG(7,36,8) = 0
-    DEG(7,36,9) = 0
-    DEG(7,36,10) = 0
-  COEF(7,36) = (0.03277915947703309, 0)
-    DEG(7,37,1) = 2
-    DEG(7,37,2) = 0
-    DEG(7,37,3) = 0
-    DEG(7,37,4) = 0
-    DEG(7,37,5) = 0
-    DEG(7,37,6) = 1
-    DEG(7,37,7) = 0
-    DEG(7,37,8) = 0
-    DEG(7,37,9) = 0
-    DEG(7,37,10) = 0
-  COEF(7,37) = (-0.8186969313136523, 0)
-    DEG(7,38,1) = 1
-    DEG(7,38,2) = 1
-    DEG(7,38,3) = 0
-    DEG(7,38,4) = 0
-    DEG(7,38,5) = 0
-    DEG(7,38,6) = 1
-    DEG(7,38,7) = 0
-    DEG(7,38,8) = 0
-    DEG(7,38,9) = 0
-    DEG(7,38,10) = 0
-  COEF(7,38) = (-0.02925076747851844, 0)
-    DEG(7,39,1) = 0
-    DEG(7,39,2) = 2
-    DEG(7,39,3) = 0
-    DEG(7,39,4) = 0
-    DEG(7,39,5) = 0
-    DEG(7,39,6) = 1
-    DEG(7,39,7) = 0
-    DEG(7,39,8) = 0
-    DEG(7,39,9) = 0
-    DEG(7,39,10) = 0
-  COEF(7,39) = (0.7392135200738452, 0)
-    DEG(7,40,1) = 1
-    DEG(7,40,2) = 0
-    DEG(7,40,3) = 1
-    DEG(7,40,4) = 0
-    DEG(7,40,5) = 0
-    DEG(7,40,6) = 1
-    DEG(7,40,7) = 0
-    DEG(7,40,8) = 0
-    DEG(7,40,9) = 0
-    DEG(7,40,10) = 0
-  COEF(7,40) = (0.12848993732517067, 0)
-    DEG(7,41,1) = 0
-    DEG(7,41,2) = 1
-    DEG(7,41,3) = 1
-    DEG(7,41,4) = 0
-    DEG(7,41,5) = 0
-    DEG(7,41,6) = 1
-    DEG(7,41,7) = 0
-    DEG(7,41,8) = 0
-    DEG(7,41,9) = 0
-    DEG(7,41,10) = 0
-  COEF(7,41) = (-0.9246721961161062, 0)
-    DEG(7,42,1) = 0
-    DEG(7,42,2) = 0
-    DEG(7,42,3) = 2
-    DEG(7,42,4) = 0
-    DEG(7,42,5) = 0
-    DEG(7,42,6) = 1
-    DEG(7,42,7) = 0
-    DEG(7,42,8) = 0
-    DEG(7,42,9) = 0
-    DEG(7,42,10) = 0
-  COEF(7,42) = (0.34711806557393554, 0)
-    DEG(7,43,1) = 2
-    DEG(7,43,2) = 0
-    DEG(7,43,3) = 0
-    DEG(7,43,4) = 1
-    DEG(7,43,5) = 0
-    DEG(7,43,6) = 1
-    DEG(7,43,7) = 0
-    DEG(7,43,8) = 0
-    DEG(7,43,9) = 0
-    DEG(7,43,10) = 0
-  COEF(7,43) = (-1.3114980542204153, 0)
-    DEG(7,44,1) = 1
-    DEG(7,44,2) = 1
-    DEG(7,44,3) = 0
-    DEG(7,44,4) = 1
-    DEG(7,44,5) = 0
-    DEG(7,44,6) = 1
-    DEG(7,44,7) = 0
-    DEG(7,44,8) = 0
-    DEG(7,44,9) = 0
-    DEG(7,44,10) = 0
-  COEF(7,44) = (0.7458693987541652, 0)
-    DEG(7,45,1) = 0
-    DEG(7,45,2) = 2
-    DEG(7,45,3) = 0
-    DEG(7,45,4) = 1
-    DEG(7,45,5) = 0
-    DEG(7,45,6) = 1
-    DEG(7,45,7) = 0
-    DEG(7,45,8) = 0
-    DEG(7,45,9) = 0
-    DEG(7,45,10) = 0
-  COEF(7,45) = (1.309443056027262, 0)
-    DEG(7,46,1) = 1
-    DEG(7,46,2) = 0
-    DEG(7,46,3) = 1
-    DEG(7,46,4) = 1
-    DEG(7,46,5) = 0
-    DEG(7,46,6) = 1
-    DEG(7,46,7) = 0
-    DEG(7,46,8) = 0
-    DEG(7,46,9) = 0
-    DEG(7,46,10) = 0
-  COEF(7,46) = (-0.5609050703954811, 0)
-    DEG(7,47,1) = 0
-    DEG(7,47,2) = 1
-    DEG(7,47,3) = 1
-    DEG(7,47,4) = 1
-    DEG(7,47,5) = 0
-    DEG(7,47,6) = 1
-    DEG(7,47,7) = 0
-    DEG(7,47,8) = 0
-    DEG(7,47,9) = 0
-    DEG(7,47,10) = 0
-  COEF(7,47) = (-0.560863866588139, 0)
-    DEG(7,48,1) = 0
-    DEG(7,48,2) = 0
-    DEG(7,48,3) = 2
-    DEG(7,48,4) = 1
-    DEG(7,48,5) = 0
-    DEG(7,48,6) = 1
-    DEG(7,48,7) = 0
-    DEG(7,48,8) = 0
-    DEG(7,48,9) = 0
-    DEG(7,48,10) = 0
-  COEF(7,48) = (0.0020549981931533984, 0)
-    DEG(7,49,1) = 2
-    DEG(7,49,2) = 0
-    DEG(7,49,3) = 0
-    DEG(7,49,4) = 0
-    DEG(7,49,5) = 1
-    DEG(7,49,6) = 1
-    DEG(7,49,7) = 0
-    DEG(7,49,8) = 0
-    DEG(7,49,9) = 0
-    DEG(7,49,10) = 0
-  COEF(7,49) = (0.21040044489655793, 0)
-    DEG(7,50,1) = 1
-    DEG(7,50,2) = 1
-    DEG(7,50,3) = 0
-    DEG(7,50,4) = 0
-    DEG(7,50,5) = 1
-    DEG(7,50,6) = 1
-    DEG(7,50,7) = 0
-    DEG(7,50,8) = 0
-    DEG(7,50,9) = 0
-    DEG(7,50,10) = 0
-  COEF(7,50) = (-2.094674294769259, 0)
-    DEG(7,51,1) = 0
-    DEG(7,51,2) = 2
-    DEG(7,51,3) = 0
-    DEG(7,51,4) = 0
-    DEG(7,51,5) = 1
-    DEG(7,51,6) = 1
-    DEG(7,51,7) = 0
-    DEG(7,51,8) = 0
-    DEG(7,51,9) = 0
-    DEG(7,51,10) = 0
-  COEF(7,51) = (0.9014935747766074, 0)
-    DEG(7,52,1) = 1
-    DEG(7,52,2) = 0
-    DEG(7,52,3) = 1
-    DEG(7,52,4) = 0
-    DEG(7,52,5) = 1
-    DEG(7,52,6) = 1
-    DEG(7,52,7) = 0
-    DEG(7,52,8) = 0
-    DEG(7,52,9) = 0
-    DEG(7,52,10) = 0
-  COEF(7,52) = (-0.7741828342315165, 0)
-    DEG(7,53,1) = 0
-    DEG(7,53,2) = 1
-    DEG(7,53,3) = 1
-    DEG(7,53,4) = 0
-    DEG(7,53,5) = 1
-    DEG(7,53,6) = 1
-    DEG(7,53,7) = 0
-    DEG(7,53,8) = 0
-    DEG(7,53,9) = 0
-    DEG(7,53,10) = 0
-  COEF(7,53) = (1.0179705141740856, 0)
-    DEG(7,54,1) = 0
-    DEG(7,54,2) = 0
-    DEG(7,54,3) = 2
-    DEG(7,54,4) = 0
-    DEG(7,54,5) = 1
-    DEG(7,54,6) = 1
-    DEG(7,54,7) = 0
-    DEG(7,54,8) = 0
-    DEG(7,54,9) = 0
-    DEG(7,54,10) = 0
-  COEF(7,54) = (-1.1118940196731655, 0)
-    DEG(7,55,1) = 2
-    DEG(7,55,2) = 0
-    DEG(7,55,3) = 0
-    DEG(7,55,4) = 0
-    DEG(7,55,5) = 0
-    DEG(7,55,6) = 2
-    DEG(7,55,7) = 0
-    DEG(7,55,8) = 0
-    DEG(7,55,9) = 0
-    DEG(7,55,10) = 0
-  COEF(7,55) = (-0.37645359229310016, 0)
-    DEG(7,56,1) = 1
-    DEG(7,56,2) = 1
-    DEG(7,56,3) = 0
-    DEG(7,56,4) = 0
-    DEG(7,56,5) = 0
-    DEG(7,56,6) = 2
-    DEG(7,56,7) = 0
-    DEG(7,56,8) = 0
-    DEG(7,56,9) = 0
-    DEG(7,56,10) = 0
-  COEF(7,56) = (0.22427335209873375, 0)
-    DEG(7,57,1) = 0
-    DEG(7,57,2) = 2
-    DEG(7,57,3) = 0
-    DEG(7,57,4) = 0
-    DEG(7,57,5) = 0
-    DEG(7,57,6) = 2
-    DEG(7,57,7) = 0
-    DEG(7,57,8) = 0
-    DEG(7,57,9) = 0
-    DEG(7,57,10) = 0
-  COEF(7,57) = (0.34817251132410243, 0)
-    DEG(7,58,1) = 1
-    DEG(7,58,2) = 0
-    DEG(7,58,3) = 1
-    DEG(7,58,4) = 0
-    DEG(7,58,5) = 0
-    DEG(7,58,6) = 2
-    DEG(7,58,7) = 0
-    DEG(7,58,8) = 0
-    DEG(7,58,9) = 0
-    DEG(7,58,10) = 0
-  COEF(7,58) = (-0.2880308763050832, 0)
-    DEG(7,59,1) = 0
-    DEG(7,59,2) = 1
-    DEG(7,59,3) = 1
-    DEG(7,59,4) = 0
-    DEG(7,59,5) = 0
-    DEG(7,59,6) = 2
-    DEG(7,59,7) = 0
-    DEG(7,59,8) = 0
-    DEG(7,59,9) = 0
-    DEG(7,59,10) = 0
-  COEF(7,59) = (-0.27093192205509137, 0)
-    DEG(7,60,1) = 0
-    DEG(7,60,2) = 0
-    DEG(7,60,3) = 2
-    DEG(7,60,4) = 0
-    DEG(7,60,5) = 0
-    DEG(7,60,6) = 2
-    DEG(7,60,7) = 0
-    DEG(7,60,8) = 0
-    DEG(7,60,9) = 0
-    DEG(7,60,10) = 0
-  COEF(7,60) = (0.028281080968997733, 0)
-    DEG(7,61,1) = 0
-    DEG(7,61,2) = 0
-    DEG(7,61,3) = 0
-    DEG(7,61,4) = 0
-    DEG(7,61,5) = 0
-    DEG(7,61,6) = 0
-    DEG(7,61,7) = 1
-    DEG(7,61,8) = 0
-    DEG(7,61,9) = 0
-    DEG(7,61,10) = 0
-  COEF(7,61) = (0.14472354381930777, 0)
-    DEG(7,62,1) = 0
-    DEG(7,62,2) = 0
-    DEG(7,62,3) = 0
-    DEG(7,62,4) = 1
-    DEG(7,62,5) = 0
-    DEG(7,62,6) = 0
-    DEG(7,62,7) = 1
-    DEG(7,62,8) = 0
-    DEG(7,62,9) = 0
-    DEG(7,62,10) = 0
-  COEF(7,62) = (1.3312987370741496, 0)
-    DEG(7,63,1) = 0
-    DEG(7,63,2) = 0
-    DEG(7,63,3) = 0
-    DEG(7,63,4) = 0
-    DEG(7,63,5) = 1
-    DEG(7,63,6) = 0
-    DEG(7,63,7) = 1
-    DEG(7,63,8) = 0
-    DEG(7,63,9) = 0
-    DEG(7,63,10) = 0
-  COEF(7,63) = (-0.560558892849028, 0)
-    DEG(7,64,1) = 0
-    DEG(7,64,2) = 0
-    DEG(7,64,3) = 0
-    DEG(7,64,4) = 0
-    DEG(7,64,5) = 0
-    DEG(7,64,6) = 1
-    DEG(7,64,7) = 1
-    DEG(7,64,8) = 0
-    DEG(7,64,9) = 0
-    DEG(7,64,10) = 0
-  COEF(7,64) = (-0.26763465433412853, 0)
-    DEG(7,65,1) = 0
-    DEG(7,65,2) = 0
-    DEG(7,65,3) = 0
-    DEG(7,65,4) = 0
-    DEG(7,65,5) = 0
-    DEG(7,65,6) = 0
-    DEG(7,65,7) = 0
-    DEG(7,65,8) = 1
-    DEG(7,65,9) = 0
-    DEG(7,65,10) = 0
-  COEF(7,65) = (0.34474968158768826, 0)
-    DEG(7,66,1) = 0
-    DEG(7,66,2) = 0
-    DEG(7,66,3) = 0
-    DEG(7,66,4) = 1
-    DEG(7,66,5) = 0
-    DEG(7,66,6) = 0
-    DEG(7,66,7) = 0
-    DEG(7,66,8) = 1
-    DEG(7,66,9) = 0
-    DEG(7,66,10) = 0
-  COEF(7,66) = (1.1967487089081013, 0)
-    DEG(7,67,1) = 0
-    DEG(7,67,2) = 0
-    DEG(7,67,3) = 0
-    DEG(7,67,4) = 0
-    DEG(7,67,5) = 1
-    DEG(7,67,6) = 0
-    DEG(7,67,7) = 0
-    DEG(7,67,8) = 1
-    DEG(7,67,9) = 0
-    DEG(7,67,10) = 0
-  COEF(7,67) = (-0.5416788729536276, 0)
-    DEG(7,68,1) = 0
-    DEG(7,68,2) = 0
-    DEG(7,68,3) = 0
-    DEG(7,68,4) = 0
-    DEG(7,68,5) = 0
-    DEG(7,68,6) = 1
-    DEG(7,68,7) = 0
-    DEG(7,68,8) = 1
-    DEG(7,68,9) = 0
-    DEG(7,68,10) = 0
-  COEF(7,68) = (0.35732161373948407, 0)
-    DEG(7,69,1) = 0
-    DEG(7,69,2) = 0
-    DEG(7,69,3) = 0
-    DEG(7,69,4) = 0
-    DEG(7,69,5) = 0
-    DEG(7,69,6) = 0
-    DEG(7,69,7) = 0
-    DEG(7,69,8) = 0
-    DEG(7,69,9) = 1
-    DEG(7,69,10) = 0
-  COEF(7,69) = (0.4086834090152563, 0)
-    DEG(7,70,1) = 0
-    DEG(7,70,2) = 0
-    DEG(7,70,3) = 0
-    DEG(7,70,4) = 1
-    DEG(7,70,5) = 0
-    DEG(7,70,6) = 0
-    DEG(7,70,7) = 0
-    DEG(7,70,8) = 0
-    DEG(7,70,9) = 1
-    DEG(7,70,10) = 0
-  COEF(7,70) = (0.9057045158335053, 0)
-    DEG(7,71,1) = 0
-    DEG(7,71,2) = 0
-    DEG(7,71,3) = 0
-    DEG(7,71,4) = 0
-    DEG(7,71,5) = 1
-    DEG(7,71,6) = 0
-    DEG(7,71,7) = 0
-    DEG(7,71,8) = 0
-    DEG(7,71,9) = 1
-    DEG(7,71,10) = 0
-  COEF(7,71) = (0.790785041402257, 0)
-    DEG(7,72,1) = 0
-    DEG(7,72,2) = 0
-    DEG(7,72,3) = 0
-    DEG(7,72,4) = 0
-    DEG(7,72,5) = 0
-    DEG(7,72,6) = 1
-    DEG(7,72,7) = 0
-    DEG(7,72,8) = 0
-    DEG(7,72,9) = 1
-    DEG(7,72,10) = 0
-  COEF(7,72) = (0.25330644272284614, 0)
-    DEG(7,73,1) = 0
-    DEG(7,73,2) = 0
-    DEG(7,73,3) = 0
-    DEG(7,73,4) = 0
-    DEG(7,73,5) = 0
-    DEG(7,73,6) = 0
-    DEG(7,73,7) = 0
-    DEG(7,73,8) = 0
-    DEG(7,73,9) = 0
-    DEG(7,73,10) = 1
-  COEF(7,73) = (-0.3854162586341408, 0)
-    DEG(7,74,1) = 0
-    DEG(7,74,2) = 0
-    DEG(7,74,3) = 0
-    DEG(7,74,4) = 1
-    DEG(7,74,5) = 0
-    DEG(7,74,6) = 0
-    DEG(7,74,7) = 0
-    DEG(7,74,8) = 0
-    DEG(7,74,9) = 0
-    DEG(7,74,10) = 1
-  COEF(7,74) = (-0.04738889206888738, 0)
-    DEG(7,75,1) = 0
-    DEG(7,75,2) = 0
-    DEG(7,75,3) = 0
-    DEG(7,75,4) = 0
-    DEG(7,75,5) = 1
-    DEG(7,75,6) = 0
-    DEG(7,75,7) = 0
-    DEG(7,75,8) = 0
-    DEG(7,75,9) = 0
-    DEG(7,75,10) = 1
-  COEF(7,75) = (1.2360880142692436, 0)
-    DEG(7,76,1) = 0
-    DEG(7,76,2) = 0
-    DEG(7,76,3) = 0
-    DEG(7,76,4) = 0
-    DEG(7,76,5) = 0
-    DEG(7,76,6) = 1
-    DEG(7,76,7) = 0
-    DEG(7,76,8) = 0
-    DEG(7,76,9) = 0
-    DEG(7,76,10) = 1
-  COEF(7,76) = (-0.03146357181747231, 0)
-
-NUM_TERMS(8) = 76
-    DEG(8,1,1) = 2
-    DEG(8,1,2) = 0
-    DEG(8,1,3) = 0
-    DEG(8,1,4) = 0
-    DEG(8,1,5) = 0
-    DEG(8,1,6) = 0
-    DEG(8,1,7) = 0
-    DEG(8,1,8) = 0
-    DEG(8,1,9) = 0
-    DEG(8,1,10) = 0
-  COEF(8,1) = (-0.3364985136694329, 0)
-    DEG(8,2,1) = 1
-    DEG(8,2,2) = 1
-    DEG(8,2,3) = 0
-    DEG(8,2,4) = 0
-    DEG(8,2,5) = 0
-    DEG(8,2,6) = 0
-    DEG(8,2,7) = 0
-    DEG(8,2,8) = 0
-    DEG(8,2,9) = 0
-    DEG(8,2,10) = 0
-  COEF(8,2) = (-0.6220713377668979, 0)
-    DEG(8,3,1) = 0
-    DEG(8,3,2) = 2
-    DEG(8,3,3) = 0
-    DEG(8,3,4) = 0
-    DEG(8,3,5) = 0
-    DEG(8,3,6) = 0
-    DEG(8,3,7) = 0
-    DEG(8,3,8) = 0
-    DEG(8,3,9) = 0
-    DEG(8,3,10) = 0
-  COEF(8,3) = (0.30253663989085705, 0)
-    DEG(8,4,1) = 1
-    DEG(8,4,2) = 0
-    DEG(8,4,3) = 1
-    DEG(8,4,4) = 0
-    DEG(8,4,5) = 0
-    DEG(8,4,6) = 0
-    DEG(8,4,7) = 0
-    DEG(8,4,8) = 0
-    DEG(8,4,9) = 0
-    DEG(8,4,10) = 0
-  COEF(8,4) = (0.09691241616903694, 0)
-    DEG(8,5,1) = 0
-    DEG(8,5,2) = 1
-    DEG(8,5,3) = 1
-    DEG(8,5,4) = 0
-    DEG(8,5,5) = 0
-    DEG(8,5,6) = 0
-    DEG(8,5,7) = 0
-    DEG(8,5,8) = 0
-    DEG(8,5,9) = 0
-    DEG(8,5,10) = 0
-  COEF(8,5) = (-0.23475287081412524, 0)
-    DEG(8,6,1) = 0
-    DEG(8,6,2) = 0
-    DEG(8,6,3) = 2
-    DEG(8,6,4) = 0
-    DEG(8,6,5) = 0
-    DEG(8,6,6) = 0
-    DEG(8,6,7) = 0
-    DEG(8,6,8) = 0
-    DEG(8,6,9) = 0
-    DEG(8,6,10) = 0
-  COEF(8,6) = (0.03759204880218851, 0)
-    DEG(8,7,1) = 2
-    DEG(8,7,2) = 0
-    DEG(8,7,3) = 0
-    DEG(8,7,4) = 1
-    DEG(8,7,5) = 0
-    DEG(8,7,6) = 0
-    DEG(8,7,7) = 0
-    DEG(8,7,8) = 0
-    DEG(8,7,9) = 0
-    DEG(8,7,10) = 0
-  COEF(8,7) = (-1.0655428995245861, 0)
-    DEG(8,8,1) = 1
-    DEG(8,8,2) = 1
-    DEG(8,8,3) = 0
-    DEG(8,8,4) = 1
-    DEG(8,8,5) = 0
-    DEG(8,8,6) = 0
-    DEG(8,8,7) = 0
-    DEG(8,8,8) = 0
-    DEG(8,8,9) = 0
-    DEG(8,8,10) = 0
-  COEF(8,8) = (1.2015525036653503, 0)
-    DEG(8,9,1) = 0
-    DEG(8,9,2) = 2
-    DEG(8,9,3) = 0
-    DEG(8,9,4) = 1
-    DEG(8,9,5) = 0
-    DEG(8,9,6) = 0
-    DEG(8,9,7) = 0
-    DEG(8,9,8) = 0
-    DEG(8,9,9) = 0
-    DEG(8,9,10) = 0
-  COEF(8,9) = (0.7601103825805371, 0)
-    DEG(8,10,1) = 1
-    DEG(8,10,2) = 0
-    DEG(8,10,3) = 1
-    DEG(8,10,4) = 1
-    DEG(8,10,5) = 0
-    DEG(8,10,6) = 0
-    DEG(8,10,7) = 0
-    DEG(8,10,8) = 0
-    DEG(8,10,9) = 0
-    DEG(8,10,10) = 0
-  COEF(8,10) = (-0.19738187400246698, 0)
-    DEG(8,11,1) = 0
-    DEG(8,11,2) = 1
-    DEG(8,11,3) = 1
-    DEG(8,11,4) = 1
-    DEG(8,11,5) = 0
-    DEG(8,11,6) = 0
-    DEG(8,11,7) = 0
-    DEG(8,11,8) = 0
-    DEG(8,11,9) = 0
-    DEG(8,11,10) = 0
-  COEF(8,11) = (0.6151569823342218, 0)
-    DEG(8,12,1) = 0
-    DEG(8,12,2) = 0
-    DEG(8,12,3) = 2
-    DEG(8,12,4) = 1
-    DEG(8,12,5) = 0
-    DEG(8,12,6) = 0
-    DEG(8,12,7) = 0
-    DEG(8,12,8) = 0
-    DEG(8,12,9) = 0
-    DEG(8,12,10) = 0
-  COEF(8,12) = (-0.19896444557080828, 0)
-    DEG(8,13,1) = 2
-    DEG(8,13,2) = 0
-    DEG(8,13,3) = 0
-    DEG(8,13,4) = 2
-    DEG(8,13,5) = 0
-    DEG(8,13,6) = 0
-    DEG(8,13,7) = 0
-    DEG(8,13,8) = 0
-    DEG(8,13,9) = 0
-    DEG(8,13,10) = 0
-  COEF(8,13) = (0.12867336914719074, 0)
-    DEG(8,14,1) = 1
-    DEG(8,14,2) = 1
-    DEG(8,14,3) = 0
-    DEG(8,14,4) = 2
-    DEG(8,14,5) = 0
-    DEG(8,14,6) = 0
-    DEG(8,14,7) = 0
-    DEG(8,14,8) = 0
-    DEG(8,14,9) = 0
-    DEG(8,14,10) = 0
-  COEF(8,14) = (1.2422164684570598, 0)
-    DEG(8,15,1) = 0
-    DEG(8,15,2) = 2
-    DEG(8,15,3) = 0
-    DEG(8,15,4) = 2
-    DEG(8,15,5) = 0
-    DEG(8,15,6) = 0
-    DEG(8,15,7) = 0
-    DEG(8,15,8) = 0
-    DEG(8,15,9) = 0
-    DEG(8,15,10) = 0
-  COEF(8,15) = (-0.32698199621342966, 0)
-    DEG(8,16,1) = 1
-    DEG(8,16,2) = 0
-    DEG(8,16,3) = 1
-    DEG(8,16,4) = 2
-    DEG(8,16,5) = 0
-    DEG(8,16,6) = 0
-    DEG(8,16,7) = 0
-    DEG(8,16,8) = 0
-    DEG(8,16,9) = 0
-    DEG(8,16,10) = 0
-  COEF(8,16) = (0.988903111633841, 0)
-    DEG(8,17,1) = 0
-    DEG(8,17,2) = 1
-    DEG(8,17,3) = 1
-    DEG(8,17,4) = 2
-    DEG(8,17,5) = 0
-    DEG(8,17,6) = 0
-    DEG(8,17,7) = 0
-    DEG(8,17,8) = 0
-    DEG(8,17,9) = 0
-    DEG(8,17,10) = 0
-  COEF(8,17) = (0.015998020944011523, 0)
-    DEG(8,18,1) = 0
-    DEG(8,18,2) = 0
-    DEG(8,18,3) = 2
-    DEG(8,18,4) = 2
-    DEG(8,18,5) = 0
-    DEG(8,18,6) = 0
-    DEG(8,18,7) = 0
-    DEG(8,18,8) = 0
-    DEG(8,18,9) = 0
-    DEG(8,18,10) = 0
-  COEF(8,18) = (0.19830862706623895, 0)
-    DEG(8,19,1) = 2
-    DEG(8,19,2) = 0
-    DEG(8,19,3) = 0
-    DEG(8,19,4) = 0
-    DEG(8,19,5) = 1
-    DEG(8,19,6) = 0
-    DEG(8,19,7) = 0
-    DEG(8,19,8) = 0
-    DEG(8,19,9) = 0
-    DEG(8,19,10) = 0
-  COEF(8,19) = (-0.36506543203523656, 0)
-    DEG(8,20,1) = 1
-    DEG(8,20,2) = 1
-    DEG(8,20,3) = 0
-    DEG(8,20,4) = 0
-    DEG(8,20,5) = 1
-    DEG(8,20,6) = 0
-    DEG(8,20,7) = 0
-    DEG(8,20,8) = 0
-    DEG(8,20,9) = 0
-    DEG(8,20,10) = 0
-  COEF(8,20) = (-1.8191248166962, 0)
-    DEG(8,21,1) = 0
-    DEG(8,21,2) = 2
-    DEG(8,21,3) = 0
-    DEG(8,21,4) = 0
-    DEG(8,21,5) = 1
-    DEG(8,21,6) = 0
-    DEG(8,21,7) = 0
-    DEG(8,21,8) = 0
-    DEG(8,21,9) = 0
-    DEG(8,21,10) = 0
-  COEF(8,21) = (-0.04702353062492582, 0)
-    DEG(8,22,1) = 1
-    DEG(8,22,2) = 0
-    DEG(8,22,3) = 1
-    DEG(8,22,4) = 0
-    DEG(8,22,5) = 1
-    DEG(8,22,6) = 0
-    DEG(8,22,7) = 0
-    DEG(8,22,8) = 0
-    DEG(8,22,9) = 0
-    DEG(8,22,10) = 0
-  COEF(8,22) = (0.22650992191881464, 0)
-    DEG(8,23,1) = 0
-    DEG(8,23,2) = 1
-    DEG(8,23,3) = 1
-    DEG(8,23,4) = 0
-    DEG(8,23,5) = 1
-    DEG(8,23,6) = 0
-    DEG(8,23,7) = 0
-    DEG(8,23,8) = 0
-    DEG(8,23,9) = 0
-    DEG(8,23,10) = 0
-  COEF(8,23) = (0.6757394159618821, 0)
-    DEG(8,24,1) = 0
-    DEG(8,24,2) = 0
-    DEG(8,24,3) = 2
-    DEG(8,24,4) = 0
-    DEG(8,24,5) = 1
-    DEG(8,24,6) = 0
-    DEG(8,24,7) = 0
-    DEG(8,24,8) = 0
-    DEG(8,24,9) = 0
-    DEG(8,24,10) = 0
-  COEF(8,24) = (-0.20784006514510822, 0)
-    DEG(8,25,1) = 2
-    DEG(8,25,2) = 0
-    DEG(8,25,3) = 0
-    DEG(8,25,4) = 1
-    DEG(8,25,5) = 1
-    DEG(8,25,6) = 0
-    DEG(8,25,7) = 0
-    DEG(8,25,8) = 0
-    DEG(8,25,9) = 0
-    DEG(8,25,10) = 0
-  COEF(8,25) = (-1.3823450011564475, 0)
-    DEG(8,26,1) = 1
-    DEG(8,26,2) = 1
-    DEG(8,26,3) = 0
-    DEG(8,26,4) = 1
-    DEG(8,26,5) = 1
-    DEG(8,26,6) = 0
-    DEG(8,26,7) = 0
-    DEG(8,26,8) = 0
-    DEG(8,26,9) = 0
-    DEG(8,26,10) = 0
-  COEF(8,26) = (-0.10921823662847378, 0)
-    DEG(8,27,1) = 0
-    DEG(8,27,2) = 2
-    DEG(8,27,3) = 0
-    DEG(8,27,4) = 1
-    DEG(8,27,5) = 1
-    DEG(8,27,6) = 0
-    DEG(8,27,7) = 0
-    DEG(8,27,8) = 0
-    DEG(8,27,9) = 0
-    DEG(8,27,10) = 0
-  COEF(8,27) = (0.9411204746791397, 0)
-    DEG(8,28,1) = 1
-    DEG(8,28,2) = 0
-    DEG(8,28,3) = 1
-    DEG(8,28,4) = 1
-    DEG(8,28,5) = 1
-    DEG(8,28,6) = 0
-    DEG(8,28,7) = 0
-    DEG(8,28,8) = 0
-    DEG(8,28,9) = 0
-    DEG(8,28,10) = 0
-  COEF(8,28) = (0.6416176172245012, 0)
-    DEG(8,29,1) = 0
-    DEG(8,29,2) = 1
-    DEG(8,29,3) = 1
-    DEG(8,29,4) = 1
-    DEG(8,29,5) = 1
-    DEG(8,29,6) = 0
-    DEG(8,29,7) = 0
-    DEG(8,29,8) = 0
-    DEG(8,29,9) = 0
-    DEG(8,29,10) = 0
-  COEF(8,29) = (0.6050178988297725, 0)
-    DEG(8,30,1) = 0
-    DEG(8,30,2) = 0
-    DEG(8,30,3) = 2
-    DEG(8,30,4) = 1
-    DEG(8,30,5) = 1
-    DEG(8,30,6) = 0
-    DEG(8,30,7) = 0
-    DEG(8,30,8) = 0
-    DEG(8,30,9) = 0
-    DEG(8,30,10) = 0
-  COEF(8,30) = (0.4412245264773078, 0)
-    DEG(8,31,1) = 2
-    DEG(8,31,2) = 0
-    DEG(8,31,3) = 0
-    DEG(8,31,4) = 0
-    DEG(8,31,5) = 2
-    DEG(8,31,6) = 0
-    DEG(8,31,7) = 0
-    DEG(8,31,8) = 0
-    DEG(8,31,9) = 0
-    DEG(8,31,10) = 0
-  COEF(8,31) = (0.06735301456610396, 0)
-    DEG(8,32,1) = 1
-    DEG(8,32,2) = 1
-    DEG(8,32,3) = 0
-    DEG(8,32,4) = 0
-    DEG(8,32,5) = 2
-    DEG(8,32,6) = 0
-    DEG(8,32,7) = 0
-    DEG(8,32,8) = 0
-    DEG(8,32,9) = 0
-    DEG(8,32,10) = 0
-  COEF(8,32) = (-0.8585408362609629, 0)
-    DEG(8,33,1) = 0
-    DEG(8,33,2) = 2
-    DEG(8,33,3) = 0
-    DEG(8,33,4) = 0
-    DEG(8,33,5) = 2
-    DEG(8,33,6) = 0
-    DEG(8,33,7) = 0
-    DEG(8,33,8) = 0
-    DEG(8,33,9) = 0
-    DEG(8,33,10) = 0
-  COEF(8,33) = (-0.3090762258515019, 0)
-    DEG(8,34,1) = 1
-    DEG(8,34,2) = 0
-    DEG(8,34,3) = 1
-    DEG(8,34,4) = 0
-    DEG(8,34,5) = 2
-    DEG(8,34,6) = 0
-    DEG(8,34,7) = 0
-    DEG(8,34,8) = 0
-    DEG(8,34,9) = 0
-    DEG(8,34,10) = 0
-  COEF(8,34) = (-0.4001418483728859, 0)
-    DEG(8,35,1) = 0
-    DEG(8,35,2) = 1
-    DEG(8,35,3) = 1
-    DEG(8,35,4) = 0
-    DEG(8,35,5) = 2
-    DEG(8,35,6) = 0
-    DEG(8,35,7) = 0
-    DEG(8,35,8) = 0
-    DEG(8,35,9) = 0
-    DEG(8,35,10) = 0
-  COEF(8,35) = (0.4779675484647562, 0)
-    DEG(8,36,1) = 0
-    DEG(8,36,2) = 0
-    DEG(8,36,3) = 2
-    DEG(8,36,4) = 0
-    DEG(8,36,5) = 2
-    DEG(8,36,6) = 0
-    DEG(8,36,7) = 0
-    DEG(8,36,8) = 0
-    DEG(8,36,9) = 0
-    DEG(8,36,10) = 0
-  COEF(8,36) = (0.24172321128539795, 0)
-    DEG(8,37,1) = 2
-    DEG(8,37,2) = 0
-    DEG(8,37,3) = 0
-    DEG(8,37,4) = 0
-    DEG(8,37,5) = 0
-    DEG(8,37,6) = 1
-    DEG(8,37,7) = 0
-    DEG(8,37,8) = 0
-    DEG(8,37,9) = 0
-    DEG(8,37,10) = 0
-  COEF(8,37) = (-0.5137007261636957, 0)
-    DEG(8,38,1) = 1
-    DEG(8,38,2) = 1
-    DEG(8,38,3) = 0
-    DEG(8,38,4) = 0
-    DEG(8,38,5) = 0
-    DEG(8,38,6) = 1
-    DEG(8,38,7) = 0
-    DEG(8,38,8) = 0
-    DEG(8,38,9) = 0
-    DEG(8,38,10) = 0
-  COEF(8,38) = (-0.9820327320175907, 0)
-    DEG(8,39,1) = 0
-    DEG(8,39,2) = 2
-    DEG(8,39,3) = 0
-    DEG(8,39,4) = 0
-    DEG(8,39,5) = 0
-    DEG(8,39,6) = 1
-    DEG(8,39,7) = 0
-    DEG(8,39,8) = 0
-    DEG(8,39,9) = 0
-    DEG(8,39,10) = 0
-  COEF(8,39) = (0.926095293449879, 0)
-    DEG(8,40,1) = 1
-    DEG(8,40,2) = 0
-    DEG(8,40,3) = 1
-    DEG(8,40,4) = 0
-    DEG(8,40,5) = 0
-    DEG(8,40,6) = 1
-    DEG(8,40,7) = 0
-    DEG(8,40,8) = 0
-    DEG(8,40,9) = 0
-    DEG(8,40,10) = 0
-  COEF(8,40) = (-0.7003487284409724, 0)
-    DEG(8,41,1) = 0
-    DEG(8,41,2) = 1
-    DEG(8,41,3) = 1
-    DEG(8,41,4) = 0
-    DEG(8,41,5) = 0
-    DEG(8,41,6) = 1
-    DEG(8,41,7) = 0
-    DEG(8,41,8) = 0
-    DEG(8,41,9) = 0
-    DEG(8,41,10) = 0
-  COEF(8,41) = (-0.9430374895060032, 0)
-    DEG(8,42,1) = 0
-    DEG(8,42,2) = 0
-    DEG(8,42,3) = 2
-    DEG(8,42,4) = 0
-    DEG(8,42,5) = 0
-    DEG(8,42,6) = 1
-    DEG(8,42,7) = 0
-    DEG(8,42,8) = 0
-    DEG(8,42,9) = 0
-    DEG(8,42,10) = 0
-  COEF(8,42) = (0.08868217302851986, 0)
-    DEG(8,43,1) = 2
-    DEG(8,43,2) = 0
-    DEG(8,43,3) = 0
-    DEG(8,43,4) = 1
-    DEG(8,43,5) = 0
-    DEG(8,43,6) = 1
-    DEG(8,43,7) = 0
-    DEG(8,43,8) = 0
-    DEG(8,43,9) = 0
-    DEG(8,43,10) = 0
-  COEF(8,43) = (-0.8028419556001375, 0)
-    DEG(8,44,1) = 1
-    DEG(8,44,2) = 1
-    DEG(8,44,3) = 0
-    DEG(8,44,4) = 1
-    DEG(8,44,5) = 0
-    DEG(8,44,6) = 1
-    DEG(8,44,7) = 0
-    DEG(8,44,8) = 0
-    DEG(8,44,9) = 0
-    DEG(8,44,10) = 0
-  COEF(8,44) = (1.4979362188623169, 0)
-    DEG(8,45,1) = 0
-    DEG(8,45,2) = 2
-    DEG(8,45,3) = 0
-    DEG(8,45,4) = 1
-    DEG(8,45,5) = 0
-    DEG(8,45,6) = 1
-    DEG(8,45,7) = 0
-    DEG(8,45,8) = 0
-    DEG(8,45,9) = 0
-    DEG(8,45,10) = 0
-  COEF(8,45) = (0.6798639272820932, 0)
-    DEG(8,46,1) = 1
-    DEG(8,46,2) = 0
-    DEG(8,46,3) = 1
-    DEG(8,46,4) = 1
-    DEG(8,46,5) = 0
-    DEG(8,46,6) = 1
-    DEG(8,46,7) = 0
-    DEG(8,46,8) = 0
-    DEG(8,46,9) = 0
-    DEG(8,46,10) = 0
-  COEF(8,46) = (-1.0625669164194511, 0)
-    DEG(8,47,1) = 0
-    DEG(8,47,2) = 1
-    DEG(8,47,3) = 1
-    DEG(8,47,4) = 1
-    DEG(8,47,5) = 0
-    DEG(8,47,6) = 1
-    DEG(8,47,7) = 0
-    DEG(8,47,8) = 0
-    DEG(8,47,9) = 0
-    DEG(8,47,10) = 0
-  COEF(8,47) = (1.6499737530190743, 0)
-    DEG(8,48,1) = 0
-    DEG(8,48,2) = 0
-    DEG(8,48,3) = 2
-    DEG(8,48,4) = 1
-    DEG(8,48,5) = 0
-    DEG(8,48,6) = 1
-    DEG(8,48,7) = 0
-    DEG(8,48,8) = 0
-    DEG(8,48,9) = 0
-    DEG(8,48,10) = 0
-  COEF(8,48) = (0.12297802831804432, 0)
-    DEG(8,49,1) = 2
-    DEG(8,49,2) = 0
-    DEG(8,49,3) = 0
-    DEG(8,49,4) = 0
-    DEG(8,49,5) = 1
-    DEG(8,49,6) = 1
-    DEG(8,49,7) = 0
-    DEG(8,49,8) = 0
-    DEG(8,49,9) = 0
-    DEG(8,49,10) = 0
-  COEF(8,49) = (-0.2829951083769471, 0)
-    DEG(8,50,1) = 1
-    DEG(8,50,2) = 1
-    DEG(8,50,3) = 0
-    DEG(8,50,4) = 0
-    DEG(8,50,5) = 1
-    DEG(8,50,6) = 1
-    DEG(8,50,7) = 0
-    DEG(8,50,8) = 0
-    DEG(8,50,9) = 0
-    DEG(8,50,10) = 0
-  COEF(8,50) = (-1.67180387717421, 0)
-    DEG(8,51,1) = 0
-    DEG(8,51,2) = 2
-    DEG(8,51,3) = 0
-    DEG(8,51,4) = 0
-    DEG(8,51,5) = 1
-    DEG(8,51,6) = 1
-    DEG(8,51,7) = 0
-    DEG(8,51,8) = 0
-    DEG(8,51,9) = 0
-    DEG(8,51,10) = 0
-  COEF(8,51) = (0.22862840829725906, 0)
-    DEG(8,52,1) = 1
-    DEG(8,52,2) = 0
-    DEG(8,52,3) = 1
-    DEG(8,52,4) = 0
-    DEG(8,52,5) = 1
-    DEG(8,52,6) = 1
-    DEG(8,52,7) = 0
-    DEG(8,52,8) = 0
-    DEG(8,52,9) = 0
-    DEG(8,52,10) = 0
-  COEF(8,52) = (-0.45573353517584536, 0)
-    DEG(8,53,1) = 0
-    DEG(8,53,2) = 1
-    DEG(8,53,3) = 1
-    DEG(8,53,4) = 0
-    DEG(8,53,5) = 1
-    DEG(8,53,6) = 1
-    DEG(8,53,7) = 0
-    DEG(8,53,8) = 0
-    DEG(8,53,9) = 0
-    DEG(8,53,10) = 0
-  COEF(8,53) = (-0.030399560249614144, 0)
-    DEG(8,54,1) = 0
-    DEG(8,54,2) = 0
-    DEG(8,54,3) = 2
-    DEG(8,54,4) = 0
-    DEG(8,54,5) = 1
-    DEG(8,54,6) = 1
-    DEG(8,54,7) = 0
-    DEG(8,54,8) = 0
-    DEG(8,54,9) = 0
-    DEG(8,54,10) = 0
-  COEF(8,54) = (0.05436670007968804, 0)
-    DEG(8,55,1) = 2
-    DEG(8,55,2) = 0
-    DEG(8,55,3) = 0
-    DEG(8,55,4) = 0
-    DEG(8,55,5) = 0
-    DEG(8,55,6) = 2
-    DEG(8,55,7) = 0
-    DEG(8,55,8) = 0
-    DEG(8,55,9) = 0
-    DEG(8,55,10) = 0
-  COEF(8,55) = (-0.1960263837132947, 0)
-    DEG(8,56,1) = 1
-    DEG(8,56,2) = 1
-    DEG(8,56,3) = 0
-    DEG(8,56,4) = 0
-    DEG(8,56,5) = 0
-    DEG(8,56,6) = 2
-    DEG(8,56,7) = 0
-    DEG(8,56,8) = 0
-    DEG(8,56,9) = 0
-    DEG(8,56,10) = 0
-  COEF(8,56) = (-0.3836756321960968, 0)
-    DEG(8,57,1) = 0
-    DEG(8,57,2) = 2
-    DEG(8,57,3) = 0
-    DEG(8,57,4) = 0
-    DEG(8,57,5) = 0
-    DEG(8,57,6) = 2
-    DEG(8,57,7) = 0
-    DEG(8,57,8) = 0
-    DEG(8,57,9) = 0
-    DEG(8,57,10) = 0
-  COEF(8,57) = (0.6360582220649316, 0)
-    DEG(8,58,1) = 1
-    DEG(8,58,2) = 0
-    DEG(8,58,3) = 1
-    DEG(8,58,4) = 0
-    DEG(8,58,5) = 0
-    DEG(8,58,6) = 2
-    DEG(8,58,7) = 0
-    DEG(8,58,8) = 0
-    DEG(8,58,9) = 0
-    DEG(8,58,10) = 0
-  COEF(8,58) = (-0.5887612632609552, 0)
-    DEG(8,59,1) = 0
-    DEG(8,59,2) = 1
-    DEG(8,59,3) = 1
-    DEG(8,59,4) = 0
-    DEG(8,59,5) = 0
-    DEG(8,59,6) = 2
-    DEG(8,59,7) = 0
-    DEG(8,59,8) = 0
-    DEG(8,59,9) = 0
-    DEG(8,59,10) = 0
-  COEF(8,59) = (-0.49396556940876774, 0)
-    DEG(8,60,1) = 0
-    DEG(8,60,2) = 0
-    DEG(8,60,3) = 2
-    DEG(8,60,4) = 0
-    DEG(8,60,5) = 0
-    DEG(8,60,6) = 2
-    DEG(8,60,7) = 0
-    DEG(8,60,8) = 0
-    DEG(8,60,9) = 0
-    DEG(8,60,10) = 0
-  COEF(8,60) = (-0.4400318383516369, 0)
-    DEG(8,61,1) = 0
-    DEG(8,61,2) = 0
-    DEG(8,61,3) = 0
-    DEG(8,61,4) = 0
-    DEG(8,61,5) = 0
-    DEG(8,61,6) = 0
-    DEG(8,61,7) = 1
-    DEG(8,61,8) = 0
-    DEG(8,61,9) = 0
-    DEG(8,61,10) = 0
-  COEF(8,61) = (-0.0036301750236126602, 0)
-    DEG(8,62,1) = 0
-    DEG(8,62,2) = 0
-    DEG(8,62,3) = 0
-    DEG(8,62,4) = 1
-    DEG(8,62,5) = 0
-    DEG(8,62,6) = 0
-    DEG(8,62,7) = 1
-    DEG(8,62,8) = 0
-    DEG(8,62,9) = 0
-    DEG(8,62,10) = 0
-  COEF(8,62) = (0.5043969625148573, 0)
-    DEG(8,63,1) = 0
-    DEG(8,63,2) = 0
-    DEG(8,63,3) = 0
-    DEG(8,63,4) = 0
-    DEG(8,63,5) = 1
-    DEG(8,63,6) = 0
-    DEG(8,63,7) = 1
-    DEG(8,63,8) = 0
-    DEG(8,63,9) = 0
-    DEG(8,63,10) = 0
-  COEF(8,63) = (0.6199290278052706, 0)
-    DEG(8,64,1) = 0
-    DEG(8,64,2) = 0
-    DEG(8,64,3) = 0
-    DEG(8,64,4) = 0
-    DEG(8,64,5) = 0
-    DEG(8,64,6) = 1
-    DEG(8,64,7) = 1
-    DEG(8,64,8) = 0
-    DEG(8,64,9) = 0
-    DEG(8,64,10) = 0
-  COEF(8,64) = (-0.5010767403147031, 0)
-    DEG(8,65,1) = 0
-    DEG(8,65,2) = 0
-    DEG(8,65,3) = 0
-    DEG(8,65,4) = 0
-    DEG(8,65,5) = 0
-    DEG(8,65,6) = 0
-    DEG(8,65,7) = 0
-    DEG(8,65,8) = 1
-    DEG(8,65,9) = 0
-    DEG(8,65,10) = 0
-  COEF(8,65) = (0.27845755063810307, 0)
-    DEG(8,66,1) = 0
-    DEG(8,66,2) = 0
-    DEG(8,66,3) = 0
-    DEG(8,66,4) = 1
-    DEG(8,66,5) = 0
-    DEG(8,66,6) = 0
-    DEG(8,66,7) = 0
-    DEG(8,66,8) = 1
-    DEG(8,66,9) = 0
-    DEG(8,66,10) = 0
-  COEF(8,66) = (0.9141858220671707, 0)
-    DEG(8,67,1) = 0
-    DEG(8,67,2) = 0
-    DEG(8,67,3) = 0
-    DEG(8,67,4) = 0
-    DEG(8,67,5) = 1
-    DEG(8,67,6) = 0
-    DEG(8,67,7) = 0
-    DEG(8,67,8) = 1
-    DEG(8,67,9) = 0
-    DEG(8,67,10) = 0
-  COEF(8,67) = (-0.04474642022970836, 0)
-    DEG(8,68,1) = 0
-    DEG(8,68,2) = 0
-    DEG(8,68,3) = 0
-    DEG(8,68,4) = 0
-    DEG(8,68,5) = 0
-    DEG(8,68,6) = 1
-    DEG(8,68,7) = 0
-    DEG(8,68,8) = 1
-    DEG(8,68,9) = 0
-    DEG(8,68,10) = 0
-  COEF(8,68) = (0.21510107355697375, 0)
-    DEG(8,69,1) = 0
-    DEG(8,69,2) = 0
-    DEG(8,69,3) = 0
-    DEG(8,69,4) = 0
-    DEG(8,69,5) = 0
-    DEG(8,69,6) = 0
-    DEG(8,69,7) = 0
-    DEG(8,69,8) = 0
-    DEG(8,69,9) = 1
-    DEG(8,69,10) = 0
-  COEF(8,69) = (0.6261152163591358, 0)
-    DEG(8,70,1) = 0
-    DEG(8,70,2) = 0
-    DEG(8,70,3) = 0
-    DEG(8,70,4) = 1
-    DEG(8,70,5) = 0
-    DEG(8,70,6) = 0
-    DEG(8,70,7) = 0
-    DEG(8,70,8) = 0
-    DEG(8,70,9) = 1
-    DEG(8,70,10) = 0
-  COEF(8,70) = (-0.23441023070199246, 0)
-    DEG(8,71,1) = 0
-    DEG(8,71,2) = 0
-    DEG(8,71,3) = 0
-    DEG(8,71,4) = 0
-    DEG(8,71,5) = 1
-    DEG(8,71,6) = 0
-    DEG(8,71,7) = 0
-    DEG(8,71,8) = 0
-    DEG(8,71,9) = 1
-    DEG(8,71,10) = 0
-  COEF(8,71) = (0.5860551333365724, 0)
-    DEG(8,72,1) = 0
-    DEG(8,72,2) = 0
-    DEG(8,72,3) = 0
-    DEG(8,72,4) = 0
-    DEG(8,72,5) = 0
-    DEG(8,72,6) = 1
-    DEG(8,72,7) = 0
-    DEG(8,72,8) = 0
-    DEG(8,72,9) = 1
-    DEG(8,72,10) = 0
-  COEF(8,72) = (0.6514610848268766, 0)
-    DEG(8,73,1) = 0
-    DEG(8,73,2) = 0
-    DEG(8,73,3) = 0
-    DEG(8,73,4) = 0
-    DEG(8,73,5) = 0
-    DEG(8,73,6) = 0
-    DEG(8,73,7) = 0
-    DEG(8,73,8) = 0
-    DEG(8,73,9) = 0
-    DEG(8,73,10) = 1
-  COEF(8,73) = (-0.1414398428437503, 0)
-    DEG(8,74,1) = 0
-    DEG(8,74,2) = 0
-    DEG(8,74,3) = 0
-    DEG(8,74,4) = 1
-    DEG(8,74,5) = 0
-    DEG(8,74,6) = 0
-    DEG(8,74,7) = 0
-    DEG(8,74,8) = 0
-    DEG(8,74,9) = 0
-    DEG(8,74,10) = 1
-  COEF(8,74) = (0.18837597417330545, 0)
-    DEG(8,75,1) = 0
-    DEG(8,75,2) = 0
-    DEG(8,75,3) = 0
-    DEG(8,75,4) = 0
-    DEG(8,75,5) = 1
-    DEG(8,75,6) = 0
-    DEG(8,75,7) = 0
-    DEG(8,75,8) = 0
-    DEG(8,75,9) = 0
-    DEG(8,75,10) = 1
-  COEF(8,75) = (0.23529746996939166, 0)
-    DEG(8,76,1) = 0
-    DEG(8,76,2) = 0
-    DEG(8,76,3) = 0
-    DEG(8,76,4) = 0
-    DEG(8,76,5) = 0
-    DEG(8,76,6) = 1
-    DEG(8,76,7) = 0
-    DEG(8,76,8) = 0
-    DEG(8,76,9) = 0
-    DEG(8,76,10) = 1
-  COEF(8,76) = (0.34502969365002717, 0)
-
-NUM_TERMS(9) = 76
-    DEG(9,1,1) = 2
-    DEG(9,1,2) = 0
-    DEG(9,1,3) = 0
-    DEG(9,1,4) = 0
-    DEG(9,1,5) = 0
-    DEG(9,1,6) = 0
-    DEG(9,1,7) = 0
-    DEG(9,1,8) = 0
-    DEG(9,1,9) = 0
-    DEG(9,1,10) = 0
-  COEF(9,1) = (-0.4997153826800627, 0)
-    DEG(9,2,1) = 1
-    DEG(9,2,2) = 1
-    DEG(9,2,3) = 0
-    DEG(9,2,4) = 0
-    DEG(9,2,5) = 0
-    DEG(9,2,6) = 0
-    DEG(9,2,7) = 0
-    DEG(9,2,8) = 0
-    DEG(9,2,9) = 0
-    DEG(9,2,10) = 0
-  COEF(9,2) = (1.1379854833548109, 0)
-    DEG(9,3,1) = 0
-    DEG(9,3,2) = 2
-    DEG(9,3,3) = 0
-    DEG(9,3,4) = 0
-    DEG(9,3,5) = 0
-    DEG(9,3,6) = 0
-    DEG(9,3,7) = 0
-    DEG(9,3,8) = 0
-    DEG(9,3,9) = 0
-    DEG(9,3,10) = 0
-  COEF(9,3) = (-0.6474309248194395, 0)
-    DEG(9,4,1) = 1
-    DEG(9,4,2) = 0
-    DEG(9,4,3) = 1
-    DEG(9,4,4) = 0
-    DEG(9,4,5) = 0
-    DEG(9,4,6) = 0
-    DEG(9,4,7) = 0
-    DEG(9,4,8) = 0
-    DEG(9,4,9) = 0
-    DEG(9,4,10) = 0
-  COEF(9,4) = (0.5441177673182162, 0)
-    DEG(9,5,1) = 0
-    DEG(9,5,2) = 1
-    DEG(9,5,3) = 1
-    DEG(9,5,4) = 0
-    DEG(9,5,5) = 0
-    DEG(9,5,6) = 0
-    DEG(9,5,7) = 0
-    DEG(9,5,8) = 0
-    DEG(9,5,9) = 0
-    DEG(9,5,10) = 0
-  COEF(9,5) = (-0.6356209362624222, 0)
-    DEG(9,6,1) = 0
-    DEG(9,6,2) = 0
-    DEG(9,6,3) = 2
-    DEG(9,6,4) = 0
-    DEG(9,6,5) = 0
-    DEG(9,6,6) = 0
-    DEG(9,6,7) = 0
-    DEG(9,6,8) = 0
-    DEG(9,6,9) = 0
-    DEG(9,6,10) = 0
-  COEF(9,6) = (-0.00249167421336129, 0)
-    DEG(9,7,1) = 2
-    DEG(9,7,2) = 0
-    DEG(9,7,3) = 0
-    DEG(9,7,4) = 1
-    DEG(9,7,5) = 0
-    DEG(9,7,6) = 0
-    DEG(9,7,7) = 0
-    DEG(9,7,8) = 0
-    DEG(9,7,9) = 0
-    DEG(9,7,10) = 0
-  COEF(9,7) = (-1.5544041627556424, 0)
-    DEG(9,8,1) = 1
-    DEG(9,8,2) = 1
-    DEG(9,8,3) = 0
-    DEG(9,8,4) = 1
-    DEG(9,8,5) = 0
-    DEG(9,8,6) = 0
-    DEG(9,8,7) = 0
-    DEG(9,8,8) = 0
-    DEG(9,8,9) = 0
-    DEG(9,8,10) = 0
-  COEF(9,8) = (2.3739950333676623, 0)
-    DEG(9,9,1) = 0
-    DEG(9,9,2) = 2
-    DEG(9,9,3) = 0
-    DEG(9,9,4) = 1
-    DEG(9,9,5) = 0
-    DEG(9,9,6) = 0
-    DEG(9,9,7) = 0
-    DEG(9,9,8) = 0
-    DEG(9,9,9) = 0
-    DEG(9,9,10) = 0
-  COEF(9,9) = (-0.626498203472872, 0)
-    DEG(9,10,1) = 1
-    DEG(9,10,2) = 0
-    DEG(9,10,3) = 1
-    DEG(9,10,4) = 1
-    DEG(9,10,5) = 0
-    DEG(9,10,6) = 0
-    DEG(9,10,7) = 0
-    DEG(9,10,8) = 0
-    DEG(9,10,9) = 0
-    DEG(9,10,10) = 0
-  COEF(9,10) = (-1.251167893581656, 0)
-    DEG(9,11,1) = 0
-    DEG(9,11,2) = 1
-    DEG(9,11,3) = 1
-    DEG(9,11,4) = 1
-    DEG(9,11,5) = 0
-    DEG(9,11,6) = 0
-    DEG(9,11,7) = 0
-    DEG(9,11,8) = 0
-    DEG(9,11,9) = 0
-    DEG(9,11,10) = 0
-  COEF(9,11) = (1.014528145879352, 0)
-    DEG(9,12,1) = 0
-    DEG(9,12,2) = 0
-    DEG(9,12,3) = 2
-    DEG(9,12,4) = 1
-    DEG(9,12,5) = 0
-    DEG(9,12,6) = 0
-    DEG(9,12,7) = 0
-    DEG(9,12,8) = 0
-    DEG(9,12,9) = 0
-    DEG(9,12,10) = 0
-  COEF(9,12) = (-0.07360314669929015, 0)
-    DEG(9,13,1) = 2
-    DEG(9,13,2) = 0
-    DEG(9,13,3) = 0
-    DEG(9,13,4) = 2
-    DEG(9,13,5) = 0
-    DEG(9,13,6) = 0
-    DEG(9,13,7) = 0
-    DEG(9,13,8) = 0
-    DEG(9,13,9) = 0
-    DEG(9,13,10) = 0
-  COEF(9,13) = (-0.11700211538167525, 0)
-    DEG(9,14,1) = 1
-    DEG(9,14,2) = 1
-    DEG(9,14,3) = 0
-    DEG(9,14,4) = 2
-    DEG(9,14,5) = 0
-    DEG(9,14,6) = 0
-    DEG(9,14,7) = 0
-    DEG(9,14,8) = 0
-    DEG(9,14,9) = 0
-    DEG(9,14,10) = 0
-  COEF(9,14) = (1.4292168664824174, 0)
-    DEG(9,15,1) = 0
-    DEG(9,15,2) = 2
-    DEG(9,15,3) = 0
-    DEG(9,15,4) = 2
-    DEG(9,15,5) = 0
-    DEG(9,15,6) = 0
-    DEG(9,15,7) = 0
-    DEG(9,15,8) = 0
-    DEG(9,15,9) = 0
-    DEG(9,15,10) = 0
-  COEF(9,15) = (-0.08561887506760898, 0)
-    DEG(9,16,1) = 1
-    DEG(9,16,2) = 0
-    DEG(9,16,3) = 1
-    DEG(9,16,4) = 2
-    DEG(9,16,5) = 0
-    DEG(9,16,6) = 0
-    DEG(9,16,7) = 0
-    DEG(9,16,8) = 0
-    DEG(9,16,9) = 0
-    DEG(9,16,10) = 0
-  COEF(9,16) = (0.11756149787203274, 0)
-    DEG(9,17,1) = 0
-    DEG(9,17,2) = 1
-    DEG(9,17,3) = 1
-    DEG(9,17,4) = 2
-    DEG(9,17,5) = 0
-    DEG(9,17,6) = 0
-    DEG(9,17,7) = 0
-    DEG(9,17,8) = 0
-    DEG(9,17,9) = 0
-    DEG(9,17,10) = 0
-  COEF(9,17) = (1.2753331275027957, 0)
-    DEG(9,18,1) = 0
-    DEG(9,18,2) = 0
-    DEG(9,18,3) = 2
-    DEG(9,18,4) = 2
-    DEG(9,18,5) = 0
-    DEG(9,18,6) = 0
-    DEG(9,18,7) = 0
-    DEG(9,18,8) = 0
-    DEG(9,18,9) = 0
-    DEG(9,18,10) = 0
-  COEF(9,18) = (0.20262099044928422, 0)
-    DEG(9,19,1) = 2
-    DEG(9,19,2) = 0
-    DEG(9,19,3) = 0
-    DEG(9,19,4) = 0
-    DEG(9,19,5) = 1
-    DEG(9,19,6) = 0
-    DEG(9,19,7) = 0
-    DEG(9,19,8) = 0
-    DEG(9,19,9) = 0
-    DEG(9,19,10) = 0
-  COEF(9,19) = (-0.5322121916934887, 0)
-    DEG(9,20,1) = 1
-    DEG(9,20,2) = 1
-    DEG(9,20,3) = 0
-    DEG(9,20,4) = 0
-    DEG(9,20,5) = 1
-    DEG(9,20,6) = 0
-    DEG(9,20,7) = 0
-    DEG(9,20,8) = 0
-    DEG(9,20,9) = 0
-    DEG(9,20,10) = 0
-  COEF(9,20) = (-0.5705836762208184, 0)
-    DEG(9,21,1) = 0
-    DEG(9,21,2) = 2
-    DEG(9,21,3) = 0
-    DEG(9,21,4) = 0
-    DEG(9,21,5) = 1
-    DEG(9,21,6) = 0
-    DEG(9,21,7) = 0
-    DEG(9,21,8) = 0
-    DEG(9,21,9) = 0
-    DEG(9,21,10) = 0
-  COEF(9,21) = (1.338552997747994, 0)
-    DEG(9,22,1) = 1
-    DEG(9,22,2) = 0
-    DEG(9,22,3) = 1
-    DEG(9,22,4) = 0
-    DEG(9,22,5) = 1
-    DEG(9,22,6) = 0
-    DEG(9,22,7) = 0
-    DEG(9,22,8) = 0
-    DEG(9,22,9) = 0
-    DEG(9,22,10) = 0
-  COEF(9,22) = (0.1626686039427204, 0)
-    DEG(9,23,1) = 0
-    DEG(9,23,2) = 1
-    DEG(9,23,3) = 1
-    DEG(9,23,4) = 0
-    DEG(9,23,5) = 1
-    DEG(9,23,6) = 0
-    DEG(9,23,7) = 0
-    DEG(9,23,8) = 0
-    DEG(9,23,9) = 0
-    DEG(9,23,10) = 0
-  COEF(9,23) = (0.8255938648528275, 0)
-    DEG(9,24,1) = 0
-    DEG(9,24,2) = 0
-    DEG(9,24,3) = 2
-    DEG(9,24,4) = 0
-    DEG(9,24,5) = 1
-    DEG(9,24,6) = 0
-    DEG(9,24,7) = 0
-    DEG(9,24,8) = 0
-    DEG(9,24,9) = 0
-    DEG(9,24,10) = 0
-  COEF(9,24) = (-0.2877403739032339, 0)
-    DEG(9,25,1) = 2
-    DEG(9,25,2) = 0
-    DEG(9,25,3) = 0
-    DEG(9,25,4) = 1
-    DEG(9,25,5) = 1
-    DEG(9,25,6) = 0
-    DEG(9,25,7) = 0
-    DEG(9,25,8) = 0
-    DEG(9,25,9) = 0
-    DEG(9,25,10) = 0
-  COEF(9,25) = (-1.7484788356484942, 0)
-    DEG(9,26,1) = 1
-    DEG(9,26,2) = 1
-    DEG(9,26,3) = 0
-    DEG(9,26,4) = 1
-    DEG(9,26,5) = 1
-    DEG(9,26,6) = 0
-    DEG(9,26,7) = 0
-    DEG(9,26,8) = 0
-    DEG(9,26,9) = 0
-    DEG(9,26,10) = 0
-  COEF(9,26) = (-0.7462669895235802, 0)
-    DEG(9,27,1) = 0
-    DEG(9,27,2) = 2
-    DEG(9,27,3) = 0
-    DEG(9,27,4) = 1
-    DEG(9,27,5) = 1
-    DEG(9,27,6) = 0
-    DEG(9,27,7) = 0
-    DEG(9,27,8) = 0
-    DEG(9,27,9) = 0
-    DEG(9,27,10) = 0
-  COEF(9,27) = (0.9024930142580471, 0)
-    DEG(9,28,1) = 1
-    DEG(9,28,2) = 0
-    DEG(9,28,3) = 1
-    DEG(9,28,4) = 1
-    DEG(9,28,5) = 1
-    DEG(9,28,6) = 0
-    DEG(9,28,7) = 0
-    DEG(9,28,8) = 0
-    DEG(9,28,9) = 0
-    DEG(9,28,10) = 0
-  COEF(9,28) = (-0.836428661723292, 0)
-    DEG(9,29,1) = 0
-    DEG(9,29,2) = 1
-    DEG(9,29,3) = 1
-    DEG(9,29,4) = 1
-    DEG(9,29,5) = 1
-    DEG(9,29,6) = 0
-    DEG(9,29,7) = 0
-    DEG(9,29,8) = 0
-    DEG(9,29,9) = 0
-    DEG(9,29,10) = 0
-  COEF(9,29) = (0.10315211869079574, 0)
-    DEG(9,30,1) = 0
-    DEG(9,30,2) = 0
-    DEG(9,30,3) = 2
-    DEG(9,30,4) = 1
-    DEG(9,30,5) = 1
-    DEG(9,30,6) = 0
-    DEG(9,30,7) = 0
-    DEG(9,30,8) = 0
-    DEG(9,30,9) = 0
-    DEG(9,30,10) = 0
-  COEF(9,30) = (0.8459858213904471, 0)
-    DEG(9,31,1) = 2
-    DEG(9,31,2) = 0
-    DEG(9,31,3) = 0
-    DEG(9,31,4) = 0
-    DEG(9,31,5) = 2
-    DEG(9,31,6) = 0
-    DEG(9,31,7) = 0
-    DEG(9,31,8) = 0
-    DEG(9,31,9) = 0
-    DEG(9,31,10) = 0
-  COEF(9,31) = (0.0524174914208927, 0)
-    DEG(9,32,1) = 1
-    DEG(9,32,2) = 1
-    DEG(9,32,3) = 0
-    DEG(9,32,4) = 0
-    DEG(9,32,5) = 2
-    DEG(9,32,6) = 0
-    DEG(9,32,7) = 0
-    DEG(9,32,8) = 0
-    DEG(9,32,9) = 0
-    DEG(9,32,10) = 0
-  COEF(9,32) = (-1.0349080883999526, 0)
-    DEG(9,33,1) = 0
-    DEG(9,33,2) = 2
-    DEG(9,33,3) = 0
-    DEG(9,33,4) = 0
-    DEG(9,33,5) = 2
-    DEG(9,33,6) = 0
-    DEG(9,33,7) = 0
-    DEG(9,33,8) = 0
-    DEG(9,33,9) = 0
-    DEG(9,33,10) = 0
-  COEF(9,33) = (-0.4456138068634661, 0)
-    DEG(9,34,1) = 1
-    DEG(9,34,2) = 0
-    DEG(9,34,3) = 1
-    DEG(9,34,4) = 0
-    DEG(9,34,5) = 2
-    DEG(9,34,6) = 0
-    DEG(9,34,7) = 0
-    DEG(9,34,8) = 0
-    DEG(9,34,9) = 0
-    DEG(9,34,10) = 0
-  COEF(9,34) = (-0.8702119648626987, 0)
-    DEG(9,35,1) = 0
-    DEG(9,35,2) = 1
-    DEG(9,35,3) = 1
-    DEG(9,35,4) = 0
-    DEG(9,35,5) = 2
-    DEG(9,35,6) = 0
-    DEG(9,35,7) = 0
-    DEG(9,35,8) = 0
-    DEG(9,35,9) = 0
-    DEG(9,35,10) = 0
-  COEF(9,35) = (0.1347633798985455, 0)
-    DEG(9,36,1) = 0
-    DEG(9,36,2) = 0
-    DEG(9,36,3) = 2
-    DEG(9,36,4) = 0
-    DEG(9,36,5) = 2
-    DEG(9,36,6) = 0
-    DEG(9,36,7) = 0
-    DEG(9,36,8) = 0
-    DEG(9,36,9) = 0
-    DEG(9,36,10) = 0
-  COEF(9,36) = (0.3931963154425734, 0)
-    DEG(9,37,1) = 2
-    DEG(9,37,2) = 0
-    DEG(9,37,3) = 0
-    DEG(9,37,4) = 0
-    DEG(9,37,5) = 0
-    DEG(9,37,6) = 1
-    DEG(9,37,7) = 0
-    DEG(9,37,8) = 0
-    DEG(9,37,9) = 0
-    DEG(9,37,10) = 0
-  COEF(9,37) = (0.7263228121576023, 0)
-    DEG(9,38,1) = 1
-    DEG(9,38,2) = 1
-    DEG(9,38,3) = 0
-    DEG(9,38,4) = 0
-    DEG(9,38,5) = 0
-    DEG(9,38,6) = 1
-    DEG(9,38,7) = 0
-    DEG(9,38,8) = 0
-    DEG(9,38,9) = 0
-    DEG(9,38,10) = 0
-  COEF(9,38) = (-2.2210658961930227, 0)
-    DEG(9,39,1) = 0
-    DEG(9,39,2) = 2
-    DEG(9,39,3) = 0
-    DEG(9,39,4) = 0
-    DEG(9,39,5) = 0
-    DEG(9,39,6) = 1
-    DEG(9,39,7) = 0
-    DEG(9,39,8) = 0
-    DEG(9,39,9) = 0
-    DEG(9,39,10) = 0
-  COEF(9,39) = (1.6108892968930464, 0)
-    DEG(9,40,1) = 1
-    DEG(9,40,2) = 0
-    DEG(9,40,3) = 1
-    DEG(9,40,4) = 0
-    DEG(9,40,5) = 0
-    DEG(9,40,6) = 1
-    DEG(9,40,7) = 0
-    DEG(9,40,8) = 0
-    DEG(9,40,9) = 0
-    DEG(9,40,10) = 0
-  COEF(9,40) = (-1.0504867050871953, 0)
-    DEG(9,41,1) = 0
-    DEG(9,41,2) = 1
-    DEG(9,41,3) = 1
-    DEG(9,41,4) = 0
-    DEG(9,41,5) = 0
-    DEG(9,41,6) = 1
-    DEG(9,41,7) = 0
-    DEG(9,41,8) = 0
-    DEG(9,41,9) = 0
-    DEG(9,41,10) = 0
-  COEF(9,41) = (1.0659099359741329, 0)
-    DEG(9,42,1) = 0
-    DEG(9,42,2) = 0
-    DEG(9,42,3) = 2
-    DEG(9,42,4) = 0
-    DEG(9,42,5) = 0
-    DEG(9,42,6) = 1
-    DEG(9,42,7) = 0
-    DEG(9,42,8) = 0
-    DEG(9,42,9) = 0
-    DEG(9,42,10) = 0
-  COEF(9,42) = (0.5672833993063003, 0)
-    DEG(9,43,1) = 2
-    DEG(9,43,2) = 0
-    DEG(9,43,3) = 0
-    DEG(9,43,4) = 1
-    DEG(9,43,5) = 0
-    DEG(9,43,6) = 1
-    DEG(9,43,7) = 0
-    DEG(9,43,8) = 0
-    DEG(9,43,9) = 0
-    DEG(9,43,10) = 0
-  COEF(9,43) = (-0.06811413086649659, 0)
-    DEG(9,44,1) = 1
-    DEG(9,44,2) = 1
-    DEG(9,44,3) = 0
-    DEG(9,44,4) = 1
-    DEG(9,44,5) = 0
-    DEG(9,44,6) = 1
-    DEG(9,44,7) = 0
-    DEG(9,44,8) = 0
-    DEG(9,44,9) = 0
-    DEG(9,44,10) = 0
-  COEF(9,44) = (-0.31001429706461026, 0)
-    DEG(9,45,1) = 0
-    DEG(9,45,2) = 2
-    DEG(9,45,3) = 0
-    DEG(9,45,4) = 1
-    DEG(9,45,5) = 0
-    DEG(9,45,6) = 1
-    DEG(9,45,7) = 0
-    DEG(9,45,8) = 0
-    DEG(9,45,9) = 0
-    DEG(9,45,10) = 0
-  COEF(9,45) = (1.4153449120254278, 0)
-    DEG(9,46,1) = 1
-    DEG(9,46,2) = 0
-    DEG(9,46,3) = 1
-    DEG(9,46,4) = 1
-    DEG(9,46,5) = 0
-    DEG(9,46,6) = 1
-    DEG(9,46,7) = 0
-    DEG(9,46,8) = 0
-    DEG(9,46,9) = 0
-    DEG(9,46,10) = 0
-  COEF(9,46) = (-1.8526453839326555, 0)
-    DEG(9,47,1) = 0
-    DEG(9,47,2) = 1
-    DEG(9,47,3) = 1
-    DEG(9,47,4) = 1
-    DEG(9,47,5) = 0
-    DEG(9,47,6) = 1
-    DEG(9,47,7) = 0
-    DEG(9,47,8) = 0
-    DEG(9,47,9) = 0
-    DEG(9,47,10) = 0
-  COEF(9,47) = (1.3321822393355465, 0)
-    DEG(9,48,1) = 0
-    DEG(9,48,2) = 0
-    DEG(9,48,3) = 2
-    DEG(9,48,4) = 1
-    DEG(9,48,5) = 0
-    DEG(9,48,6) = 1
-    DEG(9,48,7) = 0
-    DEG(9,48,8) = 0
-    DEG(9,48,9) = 0
-    DEG(9,48,10) = 0
-  COEF(9,48) = (-1.3472307811589312, 0)
-    DEG(9,49,1) = 2
-    DEG(9,49,2) = 0
-    DEG(9,49,3) = 0
-    DEG(9,49,4) = 0
-    DEG(9,49,5) = 1
-    DEG(9,49,6) = 1
-    DEG(9,49,7) = 0
-    DEG(9,49,8) = 0
-    DEG(9,49,9) = 0
-    DEG(9,49,10) = 0
-  COEF(9,49) = (0.8918357940981352, 0)
-    DEG(9,50,1) = 1
-    DEG(9,50,2) = 1
-    DEG(9,50,3) = 0
-    DEG(9,50,4) = 0
-    DEG(9,50,5) = 1
-    DEG(9,50,6) = 1
-    DEG(9,50,7) = 0
-    DEG(9,50,8) = 0
-    DEG(9,50,9) = 0
-    DEG(9,50,10) = 0
-  COEF(9,50) = (-1.500420306224534, 0)
-    DEG(9,51,1) = 0
-    DEG(9,51,2) = 2
-    DEG(9,51,3) = 0
-    DEG(9,51,4) = 0
-    DEG(9,51,5) = 1
-    DEG(9,51,6) = 1
-    DEG(9,51,7) = 0
-    DEG(9,51,8) = 0
-    DEG(9,51,9) = 0
-    DEG(9,51,10) = 0
-  COEF(9,51) = (-0.43633002867072346, 0)
-    DEG(9,52,1) = 1
-    DEG(9,52,2) = 0
-    DEG(9,52,3) = 1
-    DEG(9,52,4) = 0
-    DEG(9,52,5) = 1
-    DEG(9,52,6) = 1
-    DEG(9,52,7) = 0
-    DEG(9,52,8) = 0
-    DEG(9,52,9) = 0
-    DEG(9,52,10) = 0
-  COEF(9,52) = (-1.087845994748532, 0)
-    DEG(9,53,1) = 0
-    DEG(9,53,2) = 1
-    DEG(9,53,3) = 1
-    DEG(9,53,4) = 0
-    DEG(9,53,5) = 1
-    DEG(9,53,6) = 1
-    DEG(9,53,7) = 0
-    DEG(9,53,8) = 0
-    DEG(9,53,9) = 0
-    DEG(9,53,10) = 0
-  COEF(9,53) = (-0.15102803926606495, 0)
-    DEG(9,54,1) = 0
-    DEG(9,54,2) = 0
-    DEG(9,54,3) = 2
-    DEG(9,54,4) = 0
-    DEG(9,54,5) = 1
-    DEG(9,54,6) = 1
-    DEG(9,54,7) = 0
-    DEG(9,54,8) = 0
-    DEG(9,54,9) = 0
-    DEG(9,54,10) = 0
-  COEF(9,54) = (-0.4555057654274117, 0)
-    DEG(9,55,1) = 2
-    DEG(9,55,2) = 0
-    DEG(9,55,3) = 0
-    DEG(9,55,4) = 0
-    DEG(9,55,5) = 0
-    DEG(9,55,6) = 2
-    DEG(9,55,7) = 0
-    DEG(9,55,8) = 0
-    DEG(9,55,9) = 0
-    DEG(9,55,10) = 0
-  COEF(9,55) = (0.06458462396078254, 0)
-    DEG(9,56,1) = 1
-    DEG(9,56,2) = 1
-    DEG(9,56,3) = 0
-    DEG(9,56,4) = 0
-    DEG(9,56,5) = 0
-    DEG(9,56,6) = 2
-    DEG(9,56,7) = 0
-    DEG(9,56,8) = 0
-    DEG(9,56,9) = 0
-    DEG(9,56,10) = 0
-  COEF(9,56) = (-0.39430877808246473, 0)
-    DEG(9,57,1) = 0
-    DEG(9,57,2) = 2
-    DEG(9,57,3) = 0
-    DEG(9,57,4) = 0
-    DEG(9,57,5) = 0
-    DEG(9,57,6) = 2
-    DEG(9,57,7) = 0
-    DEG(9,57,8) = 0
-    DEG(9,57,9) = 0
-    DEG(9,57,10) = 0
-  COEF(9,57) = (0.5312326819310751, 0)
-    DEG(9,58,1) = 1
-    DEG(9,58,2) = 0
-    DEG(9,58,3) = 1
-    DEG(9,58,4) = 0
-    DEG(9,58,5) = 0
-    DEG(9,58,6) = 2
-    DEG(9,58,7) = 0
-    DEG(9,58,8) = 0
-    DEG(9,58,9) = 0
-    DEG(9,58,10) = 0
-  COEF(9,58) = (0.752650466990666, 0)
-    DEG(9,59,1) = 0
-    DEG(9,59,2) = 1
-    DEG(9,59,3) = 1
-    DEG(9,59,4) = 0
-    DEG(9,59,5) = 0
-    DEG(9,59,6) = 2
-    DEG(9,59,7) = 0
-    DEG(9,59,8) = 0
-    DEG(9,59,9) = 0
-    DEG(9,59,10) = 0
-  COEF(9,59) = (-1.4100965074013412, 0)
-    DEG(9,60,1) = 0
-    DEG(9,60,2) = 0
-    DEG(9,60,3) = 2
-    DEG(9,60,4) = 0
-    DEG(9,60,5) = 0
-    DEG(9,60,6) = 2
-    DEG(9,60,7) = 0
-    DEG(9,60,8) = 0
-    DEG(9,60,9) = 0
-    DEG(9,60,10) = 0
-  COEF(9,60) = (-0.5958173058918577, 0)
-    DEG(9,61,1) = 0
-    DEG(9,61,2) = 0
-    DEG(9,61,3) = 0
-    DEG(9,61,4) = 0
-    DEG(9,61,5) = 0
-    DEG(9,61,6) = 0
-    DEG(9,61,7) = 1
-    DEG(9,61,8) = 0
-    DEG(9,61,9) = 0
-    DEG(9,61,10) = 0
-  COEF(9,61) = (1.1496379817128635, 0)
-    DEG(9,62,1) = 0
-    DEG(9,62,2) = 0
-    DEG(9,62,3) = 0
-    DEG(9,62,4) = 1
-    DEG(9,62,5) = 0
-    DEG(9,62,6) = 0
-    DEG(9,62,7) = 1
-    DEG(9,62,8) = 0
-    DEG(9,62,9) = 0
-    DEG(9,62,10) = 0
-  COEF(9,62) = (2.2545055129278047, 0)
-    DEG(9,63,1) = 0
-    DEG(9,63,2) = 0
-    DEG(9,63,3) = 0
-    DEG(9,63,4) = 0
-    DEG(9,63,5) = 1
-    DEG(9,63,6) = 0
-    DEG(9,63,7) = 1
-    DEG(9,63,8) = 0
-    DEG(9,63,9) = 0
-    DEG(9,63,10) = 0
-  COEF(9,63) = (-0.5186004321512713, 0)
-    DEG(9,64,1) = 0
-    DEG(9,64,2) = 0
-    DEG(9,64,3) = 0
-    DEG(9,64,4) = 0
-    DEG(9,64,5) = 0
-    DEG(9,64,6) = 1
-    DEG(9,64,7) = 1
-    DEG(9,64,8) = 0
-    DEG(9,64,9) = 0
-    DEG(9,64,10) = 0
-  COEF(9,64) = (-2.904495508356949, 0)
-    DEG(9,65,1) = 0
-    DEG(9,65,2) = 0
-    DEG(9,65,3) = 0
-    DEG(9,65,4) = 0
-    DEG(9,65,5) = 0
-    DEG(9,65,6) = 0
-    DEG(9,65,7) = 0
-    DEG(9,65,8) = 1
-    DEG(9,65,9) = 0
-    DEG(9,65,10) = 0
-  COEF(9,65) = (0.3811371457709, 0)
-    DEG(9,66,1) = 0
-    DEG(9,66,2) = 0
-    DEG(9,66,3) = 0
-    DEG(9,66,4) = 1
-    DEG(9,66,5) = 0
-    DEG(9,66,6) = 0
-    DEG(9,66,7) = 0
-    DEG(9,66,8) = 1
-    DEG(9,66,9) = 0
-    DEG(9,66,10) = 0
-  COEF(9,66) = (1.1561384774363503, 0)
-    DEG(9,67,1) = 0
-    DEG(9,67,2) = 0
-    DEG(9,67,3) = 0
-    DEG(9,67,4) = 0
-    DEG(9,67,5) = 1
-    DEG(9,67,6) = 0
-    DEG(9,67,7) = 0
-    DEG(9,67,8) = 1
-    DEG(9,67,9) = 0
-    DEG(9,67,10) = 0
-  COEF(9,67) = (-0.03459051968276095, 0)
-    DEG(9,68,1) = 0
-    DEG(9,68,2) = 0
-    DEG(9,68,3) = 0
-    DEG(9,68,4) = 0
-    DEG(9,68,5) = 0
-    DEG(9,68,6) = 1
-    DEG(9,68,7) = 0
-    DEG(9,68,8) = 1
-    DEG(9,68,9) = 0
-    DEG(9,68,10) = 0
-  COEF(9,68) = (-0.5860104174434722, 0)
-    DEG(9,69,1) = 0
-    DEG(9,69,2) = 0
-    DEG(9,69,3) = 0
-    DEG(9,69,4) = 0
-    DEG(9,69,5) = 0
-    DEG(9,69,6) = 0
-    DEG(9,69,7) = 0
-    DEG(9,69,8) = 0
-    DEG(9,69,9) = 1
-    DEG(9,69,10) = 0
-  COEF(9,69) = (-0.42262305475993184, 0)
-    DEG(9,70,1) = 0
-    DEG(9,70,2) = 0
-    DEG(9,70,3) = 0
-    DEG(9,70,4) = 1
-    DEG(9,70,5) = 0
-    DEG(9,70,6) = 0
-    DEG(9,70,7) = 0
-    DEG(9,70,8) = 0
-    DEG(9,70,9) = 1
-    DEG(9,70,10) = 0
-  COEF(9,70) = (-0.06960283700014054, 0)
-    DEG(9,71,1) = 0
-    DEG(9,71,2) = 0
-    DEG(9,71,3) = 0
-    DEG(9,71,4) = 0
-    DEG(9,71,5) = 1
-    DEG(9,71,6) = 0
-    DEG(9,71,7) = 0
-    DEG(9,71,8) = 0
-    DEG(9,71,9) = 1
-    DEG(9,71,10) = 0
-  COEF(9,71) = (0.6975228406191866, 0)
-    DEG(9,72,1) = 0
-    DEG(9,72,2) = 0
-    DEG(9,72,3) = 0
-    DEG(9,72,4) = 0
-    DEG(9,72,5) = 0
-    DEG(9,72,6) = 1
-    DEG(9,72,7) = 0
-    DEG(9,72,8) = 0
-    DEG(9,72,9) = 1
-    DEG(9,72,10) = 0
-  COEF(9,72) = (1.1761445768437886, 0)
-    DEG(9,73,1) = 0
-    DEG(9,73,2) = 0
-    DEG(9,73,3) = 0
-    DEG(9,73,4) = 0
-    DEG(9,73,5) = 0
-    DEG(9,73,6) = 0
-    DEG(9,73,7) = 0
-    DEG(9,73,8) = 0
-    DEG(9,73,9) = 0
-    DEG(9,73,10) = 1
-  COEF(9,73) = (-0.4132504788764938, 0)
-    DEG(9,74,1) = 0
-    DEG(9,74,2) = 0
-    DEG(9,74,3) = 0
-    DEG(9,74,4) = 1
-    DEG(9,74,5) = 0
-    DEG(9,74,6) = 0
-    DEG(9,74,7) = 0
-    DEG(9,74,8) = 0
-    DEG(9,74,9) = 0
-    DEG(9,74,10) = 1
-  COEF(9,74) = (1.0477095469315294, 0)
-    DEG(9,75,1) = 0
-    DEG(9,75,2) = 0
-    DEG(9,75,3) = 0
-    DEG(9,75,4) = 0
-    DEG(9,75,5) = 1
-    DEG(9,75,6) = 0
-    DEG(9,75,7) = 0
-    DEG(9,75,8) = 0
-    DEG(9,75,9) = 0
-    DEG(9,75,10) = 1
-  COEF(9,75) = (0.5581768684334514, 0)
-    DEG(9,76,1) = 0
-    DEG(9,76,2) = 0
-    DEG(9,76,3) = 0
-    DEG(9,76,4) = 0
-    DEG(9,76,5) = 0
-    DEG(9,76,6) = 1
-    DEG(9,76,7) = 0
-    DEG(9,76,8) = 0
-    DEG(9,76,9) = 0
-    DEG(9,76,10) = 1
-  COEF(9,76) = (0.4360576481532085, 0)
-
-NUM_TERMS(10) = 4
-    DEG(10,1,1) = 0
-    DEG(10,1,2) = 0
-    DEG(10,1,3) = 0
-    DEG(10,1,4) = 0
-    DEG(10,1,5) = 0
-    DEG(10,1,6) = 0
-    DEG(10,1,7) = 0
-    DEG(10,1,8) = 0
-    DEG(10,1,9) = 0
-    DEG(10,1,10) = 0
-  COEF(10,1) = (-1., 0)
-    DEG(10,2,1) = 1
-    DEG(10,2,2) = 0
-    DEG(10,2,3) = 0
-    DEG(10,2,4) = 0
-    DEG(10,2,5) = 0
-    DEG(10,2,6) = 0
-    DEG(10,2,7) = 0
-    DEG(10,2,8) = 0
-    DEG(10,2,9) = 0
-    DEG(10,2,10) = 0
-  COEF(10,2) = (0.9336143308746049, 0)
-    DEG(10,3,1) = 0
-    DEG(10,3,2) = 1
-    DEG(10,3,3) = 0
-    DEG(10,3,4) = 0
-    DEG(10,3,5) = 0
-    DEG(10,3,6) = 0
-    DEG(10,3,7) = 0
-    DEG(10,3,8) = 0
-    DEG(10,3,9) = 0
-    DEG(10,3,10) = 0
-  COEF(10,3) = (1.1781580271766483, 0)
-    DEG(10,4,1) = 0
-    DEG(10,4,2) = 0
-    DEG(10,4,3) = 1
-    DEG(10,4,4) = 0
-    DEG(10,4,5) = 0
-    DEG(10,4,6) = 0
-    DEG(10,4,7) = 0
-    DEG(10,4,8) = 0
-    DEG(10,4,9) = 0
-    DEG(10,4,10) = 0
-  COEF(10,4) = (0.551650235747964, 0)
-
-/
-
-&SYSGLPSET ROOT_COUNT_ONLY = .FALSE.
-P(1) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(2) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(3) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(4) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(5) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(6) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(7) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(8) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(9) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2, q3}, {p1, p2, p3}}'
-P(10) = '{{g1, g2, g3}, {p1, p2, p3, q0, q1, q2 ,q3}'
-DG(1) = '{2, 1, 1}'
-DG(2) = '{2, 1, 1}'
-DG(3) = '{2, 1, 1}'
-DG(4) = '{2, 1, 1}'
-DG(5) = '{2, 1, 1}'
-DG(6) = '{2, 1, 1}'
-DG(7) = '{2, 1, 1}'
-DG(8) = '{2, 1, 1}'
-DG(9) = '{2, 1, 1}'
-DG(10) = '{1, 0}'
-
-NUM_SETS(1) = 3
-  NUM_INDICES(1,1) = 3  SET_DEG(1,1) = 2
-    INDEX(1,1,1) = 1
-    INDEX(1,1,2) = 2
-    INDEX(1,1,3) = 3
-  NUM_INDICES(1,2) = 7  SET_DEG(1,2) = 1
-    INDEX(1,2,1) = 4
-    INDEX(1,2,2) = 5
-    INDEX(1,2,3) = 6
-    INDEX(1,2,4) = 7
-    INDEX(1,2,5) = 8
-    INDEX(1,2,6) = 9
-    INDEX(1,2,7) = 10
-  NUM_INDICES(1,3) = 3  SET_DEG(1,3) = 1
-    INDEX(1,3,1) = 4
-    INDEX(1,3,2) = 5
-    INDEX(1,3,3) = 6
-NUM_SETS(2) = 3
-  NUM_INDICES(2,1) = 3  SET_DEG(2,1) = 2
-    INDEX(2,1,1) = 1
-    INDEX(2,1,2) = 2
-    INDEX(2,1,3) = 3
-  NUM_INDICES(2,2) = 7  SET_DEG(2,2) = 1
-    INDEX(2,2,1) = 4
-    INDEX(2,2,2) = 5
-    INDEX(2,2,3) = 6
-    INDEX(2,2,4) = 7
-    INDEX(2,2,5) = 8
-    INDEX(2,2,6) = 9
-    INDEX(2,2,7) = 10
-  NUM_INDICES(2,3) = 3  SET_DEG(2,3) = 1
-    INDEX(2,3,1) = 4
-    INDEX(2,3,2) = 5
-    INDEX(2,3,3) = 6
-NUM_SETS(3) = 3
-  NUM_INDICES(3,1) = 3  SET_DEG(3,1) = 2
-    INDEX(3,1,1) = 1
-    INDEX(3,1,2) = 2
-    INDEX(3,1,3) = 3
-  NUM_INDICES(3,2) = 7  SET_DEG(3,2) = 1
-    INDEX(3,2,1) = 4
-    INDEX(3,2,2) = 5
-    INDEX(3,2,3) = 6
-    INDEX(3,2,4) = 7
-    INDEX(3,2,5) = 8
-    INDEX(3,2,6) = 9
-    INDEX(3,2,7) = 10
-  NUM_INDICES(3,3) = 3  SET_DEG(3,3) = 1
-    INDEX(3,3,1) = 4
-    INDEX(3,3,2) = 5
-    INDEX(3,3,3) = 6
-NUM_SETS(4) = 3
-  NUM_INDICES(4,1) = 3  SET_DEG(4,1) = 2
-    INDEX(4,1,1) = 1
-    INDEX(4,1,2) = 2
-    INDEX(4,1,3) = 3
-  NUM_INDICES(4,2) = 7  SET_DEG(4,2) = 1
-    INDEX(4,2,1) = 4
-    INDEX(4,2,2) = 5
-    INDEX(4,2,3) = 6
-    INDEX(4,2,4) = 7
-    INDEX(4,2,5) = 8
-    INDEX(4,2,6) = 9
-    INDEX(4,2,7) = 10
-  NUM_INDICES(4,3) = 3  SET_DEG(4,3) = 1
-    INDEX(4,3,1) = 4
-    INDEX(4,3,2) = 5
-    INDEX(4,3,3) = 6
-NUM_SETS(5) = 3
-  NUM_INDICES(5,1) = 3  SET_DEG(5,1) = 2
-    INDEX(5,1,1) = 1
-    INDEX(5,1,2) = 2
-    INDEX(5,1,3) = 3
-  NUM_INDICES(5,2) = 7  SET_DEG(5,2) = 1
-    INDEX(5,2,1) = 4
-    INDEX(5,2,2) = 5
-    INDEX(5,2,3) = 6
-    INDEX(5,2,4) = 7
-    INDEX(5,2,5) = 8
-    INDEX(5,2,6) = 9
-    INDEX(5,2,7) = 10
-  NUM_INDICES(5,3) = 3  SET_DEG(5,3) = 1
-    INDEX(5,3,1) = 4
-    INDEX(5,3,2) = 5
-    INDEX(5,3,3) = 6
-NUM_SETS(6) = 3
-  NUM_INDICES(6,1) = 3  SET_DEG(6,1) = 2
-    INDEX(6,1,1) = 1
-    INDEX(6,1,2) = 2
-    INDEX(6,1,3) = 3
-  NUM_INDICES(6,2) = 7  SET_DEG(6,2) = 1
-    INDEX(6,2,1) = 4
-    INDEX(6,2,2) = 5
-    INDEX(6,2,3) = 6
-    INDEX(6,2,4) = 7
-    INDEX(6,2,5) = 8
-    INDEX(6,2,6) = 9
-    INDEX(6,2,7) = 10
-  NUM_INDICES(6,3) = 3  SET_DEG(6,3) = 1
-    INDEX(6,3,1) = 4
-    INDEX(6,3,2) = 5
-    INDEX(6,3,3) = 6
-NUM_SETS(7) = 3
-  NUM_INDICES(7,1) = 3  SET_DEG(7,1) = 2
-    INDEX(7,1,1) = 1
-    INDEX(7,1,2) = 2
-    INDEX(7,1,3) = 3
-  NUM_INDICES(7,2) = 7  SET_DEG(7,2) = 1
-    INDEX(7,2,1) = 4
-    INDEX(7,2,2) = 5
-    INDEX(7,2,3) = 6
-    INDEX(7,2,4) = 7
-    INDEX(7,2,5) = 8
-    INDEX(7,2,6) = 9
-    INDEX(7,2,7) = 10
-  NUM_INDICES(7,3) = 3  SET_DEG(7,3) = 1
-    INDEX(7,3,1) = 4
-    INDEX(7,3,2) = 5
-    INDEX(7,3,3) = 6
-NUM_SETS(8) = 3
-  NUM_INDICES(8,1) = 3  SET_DEG(8,1) = 2
-    INDEX(8,1,1) = 1
-    INDEX(8,1,2) = 2
-    INDEX(8,1,3) = 3
-  NUM_INDICES(8,2) = 7  SET_DEG(8,2) = 1
-    INDEX(8,2,1) = 4
-    INDEX(8,2,2) = 5
-    INDEX(8,2,3) = 6
-    INDEX(8,2,4) = 7
-    INDEX(8,2,5) = 8
-    INDEX(8,2,6) = 9
-    INDEX(8,2,7) = 10
-  NUM_INDICES(8,3) = 3  SET_DEG(8,3) = 1
-    INDEX(8,3,1) = 4
-    INDEX(8,3,2) = 5
-    INDEX(8,3,3) = 6
-NUM_SETS(9) = 3
-  NUM_INDICES(9,1) = 3  SET_DEG(9,1) = 2
-    INDEX(9,1,1) = 1
-    INDEX(9,1,2) = 2
-    INDEX(9,1,3) = 3
-  NUM_INDICES(9,2) = 7  SET_DEG(9,2) = 1
-    INDEX(9,2,1) = 4
-    INDEX(9,2,2) = 5
-    INDEX(9,2,3) = 6
-    INDEX(9,2,4) = 7
-    INDEX(9,2,5) = 8
-    INDEX(9,2,6) = 9
-    INDEX(9,2,7) = 10
-  NUM_INDICES(9,3) = 3  SET_DEG(9,3) = 1
-    INDEX(9,3,1) = 4
-    INDEX(9,3,2) = 5
-    INDEX(9,3,3) = 6
-NUM_SETS(10) = 2
-  NUM_INDICES(10,1) = 3  SET_DEG(10,1) = 1
-    INDEX(10,1,1) = 1
-    INDEX(10,1,2) = 2
-    INDEX(10,1,3) = 3
-  NUM_INDICES(10,2) = 7  SET_DEG(10,2) = 0
-    INDEX(10,2,1) = 4
-    INDEX(10,2,2) = 5
-    INDEX(10,2,3) = 6
-    INDEX(10,2,4) = 7
-    INDEX(10,2,5) = 8
-    INDEX(10,2,6) = 9
-    INDEX(10,2,7) = 10
-/
diff --git a/sandbox/857/lapack_glp.f b/sandbox/857/lapack_glp.f
deleted file mode 100644
index 8afc4c0..0000000
--- a/sandbox/857/lapack_glp.f
+++ /dev/null
@@ -1,8114 +0,0 @@
-* This file contains the BLAS and LAPACK (double precision) routines
-* used by the POLSYS_GLP package.  The file is in fixed source form.
-*
-      SUBROUTINE DTRSV ( UPLO, TRANS, DIAG, N, A, LDA, X, INCX )
-*     .. Scalar Arguments ..
-      INTEGER            INCX, LDA, N
-      CHARACTER*1        DIAG, TRANS, UPLO
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DTRSV  solves one of the systems of equations
-*
-*     A*x = b,   or   A'*x = b,
-*
-*  where b and x are n element vectors and A is an n by n unit, or
-*  non-unit, upper or lower triangular matrix.
-*
-*  No test for singularity or near-singularity is included in this
-*  routine. Such tests must be performed before calling this routine.
-*
-*  Parameters
-*  ==========
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the equations to be solved as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   A*x = b.
-*
-*              TRANS = 'T' or 't'   A'*x = b.
-*
-*              TRANS = 'C' or 'c'   A'*x = b.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit
-*           triangular as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the order of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry with  UPLO = 'U' or 'u', the leading n by n
-*           upper triangular part of the array A must contain the upper
-*           triangular matrix and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry with UPLO = 'L' or 'l', the leading n by n
-*           lower triangular part of the array A must contain the lower
-*           triangular matrix and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u', the diagonal elements of
-*           A are not referenced either, but are assumed to be unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, n ).
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the n
-*           element right-hand side vector b. On exit, X is overwritten
-*           with the solution vector x.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER        ( ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, J, JX, KX
-      LOGICAL            NOUNIT
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( UPLO , 'U' ).AND.
-     $         .NOT.LSAME( UPLO , 'L' )      )THEN
-         INFO = 1
-      ELSE IF( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 2
-      ELSE IF( .NOT.LSAME( DIAG , 'U' ).AND.
-     $         .NOT.LSAME( DIAG , 'N' )      )THEN
-         INFO = 3
-      ELSE IF( N.LT.0 )THEN
-         INFO = 4
-      ELSE IF( LDA.LT.MAX( 1, N ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DTRSV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      NOUNIT = LSAME( DIAG, 'N' )
-*
-*     Set up the start point in X if the increment is not unity. This
-*     will be  ( N - 1 )*INCX  too small for descending loops.
-*
-      IF( INCX.LE.0 )THEN
-         KX = 1 - ( N - 1 )*INCX
-      ELSE IF( INCX.NE.1 )THEN
-         KX = 1
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  x := inv( A )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 20, J = N, 1, -1
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 10, I = J - 1, 1, -1
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   10                CONTINUE
-                  END IF
-   20          CONTINUE
-            ELSE
-               JX = KX + ( N - 1 )*INCX
-               DO 40, J = N, 1, -1
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 30, I = J - 1, 1, -1
-                        IX      = IX      - INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   30                CONTINUE
-                  END IF
-                  JX = JX - INCX
-   40          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 60, J = 1, N
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 50, I = J + 1, N
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   50                CONTINUE
-                  END IF
-   60          CONTINUE
-            ELSE
-               JX = KX
-               DO 80, J = 1, N
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 70, I = J + 1, N
-                        IX      = IX      + INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   70                CONTINUE
-                  END IF
-                  JX = JX + INCX
-   80          CONTINUE
-            END IF
-         END IF
-      ELSE
-*
-*        Form  x := inv( A' )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 100, J = 1, N
-                  TEMP = X( J )
-                  DO 90, I = 1, J - 1
-                     TEMP = TEMP - A( I, J )*X( I )
-   90             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( J ) = TEMP
-  100          CONTINUE
-            ELSE
-               JX = KX
-               DO 120, J = 1, N
-                  TEMP = X( JX )
-                  IX   = KX
-                  DO 110, I = 1, J - 1
-                     TEMP = TEMP - A( I, J )*X( IX )
-                     IX   = IX   + INCX
-  110             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( JX ) = TEMP
-                  JX      = JX   + INCX
-  120          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 140, J = N, 1, -1
-                  TEMP = X( J )
-                  DO 130, I = N, J + 1, -1
-                     TEMP = TEMP - A( I, J )*X( I )
-  130             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( J ) = TEMP
-  140          CONTINUE
-            ELSE
-               KX = KX + ( N - 1 )*INCX
-               JX = KX
-               DO 160, J = N, 1, -1
-                  TEMP = X( JX )
-                  IX   = KX
-                  DO 150, I = N, J + 1, -1
-                     TEMP = TEMP - A( I, J )*X( IX )
-                     IX   = IX   - INCX
-  150             CONTINUE
-                  IF( NOUNIT )
-     $               TEMP = TEMP/A( J, J )
-                  X( JX ) = TEMP
-                  JX      = JX   - INCX
-  160          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DTRSV .
-*
-      END
-      SUBROUTINE DORMQR( SIDE, TRANS, M, N, K, A, LDA, TAU, C, LDC,
-     $                   WORK, LWORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     March 31, 1993
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE, TRANS
-      INTEGER            INFO, K, LDA, LDC, LWORK, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), C( LDC, * ), TAU( * ),
-     $                   WORK( LWORK )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DORMQR overwrites the general real M-by-N matrix C with
-*
-*                  SIDE = 'L'     SIDE = 'R'
-*  TRANS = 'N':      Q * C          C * Q
-*  TRANS = 'T':      Q**T * C       C * Q**T
-*
-*  where Q is a real orthogonal matrix defined as the product of k
-*  elementary reflectors
-*
-*        Q = H(1) H(2) . . . H(k)
-*
-*  as returned by DGEQRF. Q is of order M if SIDE = 'L' and of order N
-*  if SIDE = 'R'.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': apply Q or Q**T from the Left;
-*          = 'R': apply Q or Q**T from the Right.
-*
-*  TRANS   (input) CHARACTER*1
-*          = 'N':  No transpose, apply Q;
-*          = 'T':  Transpose, apply Q**T.
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C. M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C. N >= 0.
-*
-*  K       (input) INTEGER
-*          The number of elementary reflectors whose product defines
-*          the matrix Q.
-*          If SIDE = 'L', M >= K >= 0;
-*          if SIDE = 'R', N >= K >= 0.
-*
-*  A       (input) DOUBLE PRECISION array, dimension (LDA,K)
-*          The i-th column must contain the vector which defines the
-*          elementary reflector H(i), for i = 1,2,...,k, as returned by
-*          DGEQRF in the first k columns of its array argument A.
-*          A is modified by the routine but restored on exit.
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.
-*          If SIDE = 'L', LDA >= max(1,M);
-*          if SIDE = 'R', LDA >= max(1,N).
-*
-*  TAU     (input) DOUBLE PRECISION array, dimension (K)
-*          TAU(i) must contain the scalar factor of the elementary
-*          reflector H(i), as returned by DGEQRF.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the M-by-N matrix C.
-*          On exit, C is overwritten by Q*C or Q**T*C or C*Q**T or C*Q.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDC >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (LWORK)
-*          On exit, if INFO = 0, WORK(1) returns the optimal LWORK.
-*
-*  LWORK   (input) INTEGER
-*          The dimension of the array WORK.
-*          If SIDE = 'L', LWORK >= max(1,N);
-*          if SIDE = 'R', LWORK >= max(1,M).
-*          For optimum performance LWORK >= N*NB if SIDE = 'L', and
-*          LWORK >= M*NB if SIDE = 'R', where NB is the optimal
-*          blocksize.
-*
-*  INFO    (output) INTEGER
-*          = 0:  successful exit
-*          < 0:  if INFO = -i, the i-th argument had an illegal value
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      INTEGER            NBMAX, LDT
-      PARAMETER          ( NBMAX = 64, LDT = NBMAX+1 )
-*     ..
-*     .. Local Scalars ..
-      LOGICAL            LEFT, NOTRAN
-      INTEGER            I, I1, I2, I3, IB, IC, IINFO, IWS, JC, LDWORK,
-     $                   MI, NB, NBMIN, NI, NQ, NW
-*     ..
-*     .. Local Arrays ..
-      DOUBLE PRECISION   T( LDT, NBMAX )
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      INTEGER            ILAENV
-      EXTERNAL           LSAME, ILAENV
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLARFB, DLARFT, DORM2R, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX, MIN
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      LEFT = LSAME( SIDE, 'L' )
-      NOTRAN = LSAME( TRANS, 'N' )
-*
-*     NQ is the order of Q and NW is the minimum dimension of WORK
-*
-      IF( LEFT ) THEN
-         NQ = M
-         NW = N
-      ELSE
-         NQ = N
-         NW = M
-      END IF
-      IF( .NOT.LEFT .AND. .NOT.LSAME( SIDE, 'R' ) ) THEN
-         INFO = -1
-      ELSE IF( .NOT.NOTRAN .AND. .NOT.LSAME( TRANS, 'T' ) ) THEN
-         INFO = -2
-      ELSE IF( M.LT.0 ) THEN
-         INFO = -3
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -4
-      ELSE IF( K.LT.0 .OR. K.GT.NQ ) THEN
-         INFO = -5
-      ELSE IF( LDA.LT.MAX( 1, NQ ) ) THEN
-         INFO = -7
-      ELSE IF( LDC.LT.MAX( 1, M ) ) THEN
-         INFO = -10
-      ELSE IF( LWORK.LT.MAX( 1, NW ) ) THEN
-         INFO = -12
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DORMQR', -INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible
-*
-      IF( M.EQ.0 .OR. N.EQ.0 .OR. K.EQ.0 ) THEN
-         WORK( 1 ) = 1
-         RETURN
-      END IF
-*
-*     Determine the block size.  NB may be at most NBMAX, where NBMAX
-*     is used to define the local array T.
-*
-      NB = MIN( NBMAX, ILAENV( 1, 'DORMQR', SIDE // TRANS, M, N, K,
-     $     -1 ) )
-      NBMIN = 2
-      LDWORK = NW
-      IF( NB.GT.1 .AND. NB.LT.K ) THEN
-         IWS = NW*NB
-         IF( LWORK.LT.IWS ) THEN
-            NB = LWORK / LDWORK
-            NBMIN = MAX( 2, ILAENV( 2, 'DORMQR', SIDE // TRANS, M, N, K,
-     $              -1 ) )
-         END IF
-      ELSE
-         IWS = NW
-      END IF
-*
-      IF( NB.LT.NBMIN .OR. NB.GE.K ) THEN
-*
-*        Use unblocked code
-*
-         CALL DORM2R( SIDE, TRANS, M, N, K, A, LDA, TAU, C, LDC, WORK,
-     $                IINFO )
-      ELSE
-*
-*        Use blocked code
-*
-         IF( ( LEFT .AND. .NOT.NOTRAN ) .OR.
-     $       ( .NOT.LEFT .AND. NOTRAN ) ) THEN
-            I1 = 1
-            I2 = K
-            I3 = NB
-         ELSE
-            I1 = ( ( K-1 ) / NB )*NB + 1
-            I2 = 1
-            I3 = -NB
-         END IF
-*
-         IF( LEFT ) THEN
-            NI = N
-            JC = 1
-         ELSE
-            MI = M
-            IC = 1
-         END IF
-*
-         DO 10 I = I1, I2, I3
-            IB = MIN( NB, K-I+1 )
-*
-*           Form the triangular factor of the block reflector
-*           H = H(i) H(i+1) . . . H(i+ib-1)
-*
-            CALL DLARFT( 'Forward', 'Columnwise', NQ-I+1, IB, A( I, I ),
-     $                   LDA, TAU( I ), T, LDT )
-            IF( LEFT ) THEN
-*
-*              H or H' is applied to C(i:m,1:n)
-*
-               MI = M - I + 1
-               IC = I
-            ELSE
-*
-*              H or H' is applied to C(1:m,i:n)
-*
-               NI = N - I + 1
-               JC = I
-            END IF
-*
-*           Apply H or H'
-*
-            CALL DLARFB( SIDE, TRANS, 'Forward', 'Columnwise', MI, NI,
-     $                   IB, A( I, I ), LDA, T, LDT, C( IC, JC ), LDC,
-     $                   WORK, LDWORK )
-   10    CONTINUE
-      END IF
-      WORK( 1 ) = IWS
-      RETURN
-*
-*     End of DORMQR
-*
-      END
-      SUBROUTINE DGEQRF( M, N, A, LDA, TAU, WORK, LWORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     March 31, 1993
-*
-*     .. Scalar Arguments ..
-      INTEGER            INFO, LDA, LWORK, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), TAU( * ), WORK( LWORK )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEQRF computes a QR factorization of a real M-by-N matrix A:
-*  A = Q * R.
-*
-*  Arguments
-*  =========
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix A.  M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix A.  N >= 0.
-*
-*  A       (input/output) DOUBLE PRECISION array, dimension (LDA,N)
-*          On entry, the M-by-N matrix A.
-*          On exit, the elements on and above the diagonal of the array
-*          contain the min(M,N)-by-N upper trapezoidal matrix R (R is
-*          upper triangular if m >= n); the elements below the diagonal,
-*          with the array TAU, represent the orthogonal matrix Q as a
-*          product of min(m,n) elementary reflectors (see Further
-*          Details).
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.  LDA >= max(1,M).
-*
-*  TAU     (output) DOUBLE PRECISION array, dimension (min(M,N))
-*          The scalar factors of the elementary reflectors (see Further
-*          Details).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (LWORK)
-*          On exit, if INFO = 0, WORK(1) returns the optimal LWORK.
-*
-*  LWORK   (input) INTEGER
-*          The dimension of the array WORK.  LWORK >= max(1,N).
-*          For optimum performance LWORK >= N*NB, where NB is
-*          the optimal blocksize.
-*
-*  INFO    (output) INTEGER
-*          = 0:  successful exit
-*          < 0:  if INFO = -i, the i-th argument had an illegal value
-*
-*  Further Details
-*  ===============
-*
-*  The matrix Q is represented as a product of elementary reflectors
-*
-*     Q = H(1) H(2) . . . H(k), where k = min(m,n).
-*
-*  Each H(i) has the form
-*
-*     H(i) = I - tau * v * v'
-*
-*  where tau is a real scalar, and v is a real vector with
-*  v(1:i-1) = 0 and v(i) = 1; v(i+1:m) is stored on exit in A(i+1:m,i),
-*  and tau in TAU(i).
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      INTEGER            I, IB, IINFO, IWS, K, LDWORK, NB, NBMIN, NX
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEQR2, DLARFB, DLARFT, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX, MIN
-*     ..
-*     .. External Functions ..
-      INTEGER            ILAENV
-      EXTERNAL           ILAENV
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      IF( M.LT.0 ) THEN
-         INFO = -1
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -2
-      ELSE IF( LDA.LT.MAX( 1, M ) ) THEN
-         INFO = -4
-      ELSE IF( LWORK.LT.MAX( 1, N ) ) THEN
-         INFO = -7
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DGEQRF', -INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible
-*
-      K = MIN( M, N )
-      IF( K.EQ.0 ) THEN
-         WORK( 1 ) = 1
-         RETURN
-      END IF
-*
-*     Determine the block size.
-*
-      NB = ILAENV( 1, 'DGEQRF', ' ', M, N, -1, -1 )
-      NBMIN = 2
-      NX = 0
-      IWS = N
-      IF( NB.GT.1 .AND. NB.LT.K ) THEN
-*
-*        Determine when to cross over from blocked to unblocked code.
-*
-         NX = MAX( 0, ILAENV( 3, 'DGEQRF', ' ', M, N, -1, -1 ) )
-         IF( NX.LT.K ) THEN
-*
-*           Determine if workspace is large enough for blocked code.
-*
-            LDWORK = N
-            IWS = LDWORK*NB
-            IF( LWORK.LT.IWS ) THEN
-*
-*              Not enough workspace to use optimal NB:  reduce NB and
-*              determine the minimum value of NB.
-*
-               NB = LWORK / LDWORK
-               NBMIN = MAX( 2, ILAENV( 2, 'DGEQRF', ' ', M, N, -1,
-     $                 -1 ) )
-            END IF
-         END IF
-      END IF
-*
-      IF( NB.GE.NBMIN .AND. NB.LT.K .AND. NX.LT.K ) THEN
-*
-*        Use blocked code initially
-*
-         DO 10 I = 1, K - NX, NB
-            IB = MIN( K-I+1, NB )
-*
-*           Compute the QR factorization of the current block
-*           A(i:m,i:i+ib-1)
-*
-            CALL DGEQR2( M-I+1, IB, A( I, I ), LDA, TAU( I ), WORK,
-     $                   IINFO )
-            IF( I+IB.LE.N ) THEN
-*
-*              Form the triangular factor of the block reflector
-*              H = H(i) H(i+1) . . . H(i+ib-1)
-*
-               CALL DLARFT( 'Forward', 'Columnwise', M-I+1, IB,
-     $                      A( I, I ), LDA, TAU( I ), WORK, LDWORK )
-*
-*              Apply H' to A(i:m,i+ib:n) from the left
-*
-               CALL DLARFB( 'Left', 'Transpose', 'Forward',
-     $                      'Columnwise', M-I+1, N-I-IB+1, IB,
-     $                      A( I, I ), LDA, WORK, LDWORK, A( I, I+IB ),
-     $                      LDA, WORK( IB+1 ), LDWORK )
-            END IF
-   10    CONTINUE
-      ELSE
-         I = 1
-      END IF
-*
-*     Use unblocked code to factor the last or only block.
-*
-      IF( I.LE.K )
-     $   CALL DGEQR2( M-I+1, N-I+1, A( I, I ), LDA, TAU( I ), WORK,
-     $                IINFO )
-*
-      WORK( 1 ) = IWS
-      RETURN
-*
-*     End of DGEQRF
-*
-      END
-      integer function idamax(n,dx,incx)
-c
-c     finds the index of element having max. absolute value.
-c     jack dongarra, linpack, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double precision dx(1),dmax
-      integer i,incx,ix,n
-c
-      idamax = 0
-      if( n .lt. 1 ) return
-      idamax = 1
-      if(n.eq.1)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      dmax = dabs(dx(ix))
-      ix = ix + incx
-      do 10 i = 2,n
-         if(dabs(dx(ix)).le.dmax) go to 5
-         idamax = i
-         dmax = dabs(dx(ix))
-    5    ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-   20 dmax = dabs(dx(1))
-      do 30 i = 2,n
-         if(dabs(dx(i)).le.dmax) go to 30
-         idamax = i
-         dmax = dabs(dx(i))
-   30 continue
-      return
-      end
-      SUBROUTINE ZTRSV ( UPLO, TRANS, DIAG, N, A, LDA, X, INCX )
-*     .. Scalar Arguments ..
-      INTEGER            INCX, LDA, N
-      CHARACTER*1        DIAG, TRANS, UPLO
-*     .. Array Arguments ..
-      COMPLEX*16         A( LDA, * ), X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZTRSV  solves one of the systems of equations
-*
-*     A*x = b,   or   A'*x = b,   or   conjg( A' )*x = b,
-*
-*  where b and x are n element vectors and A is an n by n unit, or
-*  non-unit, upper or lower triangular matrix.
-*
-*  No test for singularity or near-singularity is included in this
-*  routine. Such tests must be performed before calling this routine.
-*
-*  Parameters
-*  ==========
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the equations to be solved as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   A*x = b.
-*
-*              TRANS = 'T' or 't'   A'*x = b.
-*
-*              TRANS = 'C' or 'c'   conjg( A' )*x = b.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit
-*           triangular as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the order of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  A      - COMPLEX*16       array of DIMENSION ( LDA, n ).
-*           Before entry with  UPLO = 'U' or 'u', the leading n by n
-*           upper triangular part of the array A must contain the upper
-*           triangular matrix and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry with UPLO = 'L' or 'l', the leading n by n
-*           lower triangular part of the array A must contain the lower
-*           triangular matrix and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u', the diagonal elements of
-*           A are not referenced either, but are assumed to be unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, n ).
-*           Unchanged on exit.
-*
-*  X      - COMPLEX*16       array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the n
-*           element right-hand side vector b. On exit, X is overwritten
-*           with the solution vector x.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      COMPLEX*16         ZERO
-      PARAMETER        ( ZERO = ( 0.0D+0, 0.0D+0 ) )
-*     .. Local Scalars ..
-      COMPLEX*16         TEMP
-      INTEGER            I, INFO, IX, J, JX, KX
-      LOGICAL            NOCONJ, NOUNIT
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG, MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( UPLO , 'U' ).AND.
-     $         .NOT.LSAME( UPLO , 'L' )      )THEN
-         INFO = 1
-      ELSE IF( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 2
-      ELSE IF( .NOT.LSAME( DIAG , 'U' ).AND.
-     $         .NOT.LSAME( DIAG , 'N' )      )THEN
-         INFO = 3
-      ELSE IF( N.LT.0 )THEN
-         INFO = 4
-      ELSE IF( LDA.LT.MAX( 1, N ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'ZTRSV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      NOCONJ = LSAME( TRANS, 'T' )
-      NOUNIT = LSAME( DIAG , 'N' )
-*
-*     Set up the start point in X if the increment is not unity. This
-*     will be  ( N - 1 )*INCX  too small for descending loops.
-*
-      IF( INCX.LE.0 )THEN
-         KX = 1 - ( N - 1 )*INCX
-      ELSE IF( INCX.NE.1 )THEN
-         KX = 1
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  x := inv( A )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 20, J = N, 1, -1
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 10, I = J - 1, 1, -1
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   10                CONTINUE
-                  END IF
-   20          CONTINUE
-            ELSE
-               JX = KX + ( N - 1 )*INCX
-               DO 40, J = N, 1, -1
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 30, I = J - 1, 1, -1
-                        IX      = IX      - INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   30                CONTINUE
-                  END IF
-                  JX = JX - INCX
-   40          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 60, J = 1, N
-                  IF( X( J ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )/A( J, J )
-                     TEMP = X( J )
-                     DO 50, I = J + 1, N
-                        X( I ) = X( I ) - TEMP*A( I, J )
-   50                CONTINUE
-                  END IF
-   60          CONTINUE
-            ELSE
-               JX = KX
-               DO 80, J = 1, N
-                  IF( X( JX ).NE.ZERO )THEN
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )/A( J, J )
-                     TEMP = X( JX )
-                     IX   = JX
-                     DO 70, I = J + 1, N
-                        IX      = IX      + INCX
-                        X( IX ) = X( IX ) - TEMP*A( I, J )
-   70                CONTINUE
-                  END IF
-                  JX = JX + INCX
-   80          CONTINUE
-            END IF
-         END IF
-      ELSE
-*
-*        Form  x := inv( A' )*x  or  x := inv( conjg( A' ) )*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 110, J = 1, N
-                  TEMP = X( J )
-                  IF( NOCONJ )THEN
-                     DO 90, I = 1, J - 1
-                        TEMP = TEMP - A( I, J )*X( I )
-   90                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 100, I = 1, J - 1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( I )
-  100                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( J ) = TEMP
-  110          CONTINUE
-            ELSE
-               JX = KX
-               DO 140, J = 1, N
-                  IX   = KX
-                  TEMP = X( JX )
-                  IF( NOCONJ )THEN
-                     DO 120, I = 1, J - 1
-                        TEMP = TEMP - A( I, J )*X( IX )
-                        IX   = IX   + INCX
-  120                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 130, I = 1, J - 1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( IX )
-                        IX   = IX   + INCX
-  130                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( JX ) = TEMP
-                  JX      = JX   + INCX
-  140          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 170, J = N, 1, -1
-                  TEMP = X( J )
-                  IF( NOCONJ )THEN
-                     DO 150, I = N, J + 1, -1
-                        TEMP = TEMP - A( I, J )*X( I )
-  150                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 160, I = N, J + 1, -1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( I )
-  160                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( J ) = TEMP
-  170          CONTINUE
-            ELSE
-               KX = KX + ( N - 1 )*INCX
-               JX = KX
-               DO 200, J = N, 1, -1
-                  IX   = KX
-                  TEMP = X( JX )
-                  IF( NOCONJ )THEN
-                     DO 180, I = N, J + 1, -1
-                        TEMP = TEMP - A( I, J )*X( IX )
-                        IX   = IX   - INCX
-  180                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/A( J, J )
-                  ELSE
-                     DO 190, I = N, J + 1, -1
-                        TEMP = TEMP - DCONJG( A( I, J ) )*X( IX )
-                        IX   = IX   - INCX
-  190                CONTINUE
-                     IF( NOUNIT )
-     $                  TEMP = TEMP/DCONJG( A( J, J ) )
-                  END IF
-                  X( JX ) = TEMP
-                  JX      = JX   - INCX
-  200          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of ZTRSV .
-*
-      END
-      SUBROUTINE ZLARFX( SIDE, M, N, V, TAU, C, LDC, WORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE
-      INTEGER            LDC, M, N
-      COMPLEX*16         TAU
-*     ..
-*     .. Array Arguments ..
-      COMPLEX*16         C( LDC, * ), V( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZLARFX applies a complex elementary reflector H to a complex m by n
-*  matrix C, from either the left or the right. H is represented in the
-*  form
-*
-*        H = I - tau * v * v'
-*
-*  where tau is a complex scalar and v is a complex vector.
-*
-*  If tau = 0, then H is taken to be the unit matrix
-*
-*  This version uses inline code if H has order < 11.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': form  H * C
-*          = 'R': form  C * H
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  V       (input) COMPLEX*16 array, dimension (M) if SIDE = 'L'
-*                                        or (N) if SIDE = 'R'
-*          The vector v in the representation of H.
-*
-*  TAU     (input) COMPLEX*16
-*          The value tau in the representation of H.
-*
-*  C       (input/output) COMPLEX*16 array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by the matrix H * C if SIDE = 'L',
-*          or C * H if SIDE = 'R'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDA >= max(1,M).
-*
-*  WORK    (workspace) COMPLEX*16 array, dimension (N) if SIDE = 'L'
-*                                            or (M) if SIDE = 'R'
-*          WORK is not referenced if H has order < 11.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      COMPLEX*16         ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D+0, ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J
-      COMPLEX*16         SUM, T1, T10, T2, T3, T4, T5, T6, T7, T8, T9,
-     $                   V1, V10, V2, V3, V4, V5, V6, V7, V8, V9
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           ZGEMV, ZGERC
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG
-*     ..
-*     .. Executable Statements ..
-*
-      IF( TAU.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*        Form  H * C, where H has order m.
-*
-         GO TO ( 10, 30, 50, 70, 90, 110, 130, 150,
-     $           170, 190 )M
-*
-*        Code for general M
-*
-*        w := C'*v
-*
-         CALL ZGEMV( 'Conjugate transpose', M, N, ONE, C, LDC, V, 1,
-     $               ZERO, WORK, 1 )
-*
-*        C := C - tau * v * w'
-*
-         CALL ZGERC( M, N, -TAU, V, 1, WORK, 1, C, LDC )
-         GO TO 410
-   10    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*DCONJG( V( 1 ) )
-         DO 20 J = 1, N
-            C( 1, J ) = T1*C( 1, J )
-   20    CONTINUE
-         GO TO 410
-   30    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         DO 40 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-   40    CONTINUE
-         GO TO 410
-   50    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         DO 60 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-   60    CONTINUE
-         GO TO 410
-   70    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         DO 80 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-   80    CONTINUE
-         GO TO 410
-   90    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         DO 100 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-  100    CONTINUE
-         GO TO 410
-  110    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         DO 120 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-  120    CONTINUE
-         GO TO 410
-  130    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         DO 140 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-  140    CONTINUE
-         GO TO 410
-  150    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         V8 = DCONJG( V( 8 ) )
-         T8 = TAU*DCONJG( V8 )
-         DO 160 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-  160    CONTINUE
-         GO TO 410
-  170    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         V8 = DCONJG( V( 8 ) )
-         T8 = TAU*DCONJG( V8 )
-         V9 = DCONJG( V( 9 ) )
-         T9 = TAU*DCONJG( V9 )
-         DO 180 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-  180    CONTINUE
-         GO TO 410
-  190    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = DCONJG( V( 1 ) )
-         T1 = TAU*DCONJG( V1 )
-         V2 = DCONJG( V( 2 ) )
-         T2 = TAU*DCONJG( V2 )
-         V3 = DCONJG( V( 3 ) )
-         T3 = TAU*DCONJG( V3 )
-         V4 = DCONJG( V( 4 ) )
-         T4 = TAU*DCONJG( V4 )
-         V5 = DCONJG( V( 5 ) )
-         T5 = TAU*DCONJG( V5 )
-         V6 = DCONJG( V( 6 ) )
-         T6 = TAU*DCONJG( V6 )
-         V7 = DCONJG( V( 7 ) )
-         T7 = TAU*DCONJG( V7 )
-         V8 = DCONJG( V( 8 ) )
-         T8 = TAU*DCONJG( V8 )
-         V9 = DCONJG( V( 9 ) )
-         T9 = TAU*DCONJG( V9 )
-         V10 = DCONJG( V( 10 ) )
-         T10 = TAU*DCONJG( V10 )
-         DO 200 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J ) +
-     $            V10*C( 10, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-            C( 10, J ) = C( 10, J ) - SUM*T10
-  200    CONTINUE
-         GO TO 410
-      ELSE
-*
-*        Form  C * H, where H has order n.
-*
-         GO TO ( 210, 230, 250, 270, 290, 310, 330, 350,
-     $           370, 390 )N
-*
-*        Code for general N
-*
-*        w := C * v
-*
-         CALL ZGEMV( 'No transpose', M, N, ONE, C, LDC, V, 1, ZERO,
-     $               WORK, 1 )
-*
-*        C := C - tau * w * v'
-*
-         CALL ZGERC( M, N, -TAU, WORK, 1, V, 1, C, LDC )
-         GO TO 410
-  210    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*DCONJG( V( 1 ) )
-         DO 220 J = 1, M
-            C( J, 1 ) = T1*C( J, 1 )
-  220    CONTINUE
-         GO TO 410
-  230    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         DO 240 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-  240    CONTINUE
-         GO TO 410
-  250    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         DO 260 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-  260    CONTINUE
-         GO TO 410
-  270    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         DO 280 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-  280    CONTINUE
-         GO TO 410
-  290    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         DO 300 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-  300    CONTINUE
-         GO TO 410
-  310    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         DO 320 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-  320    CONTINUE
-         GO TO 410
-  330    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         DO 340 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-  340    CONTINUE
-         GO TO 410
-  350    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         V8 = V( 8 )
-         T8 = TAU*DCONJG( V8 )
-         DO 360 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-  360    CONTINUE
-         GO TO 410
-  370    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         V8 = V( 8 )
-         T8 = TAU*DCONJG( V8 )
-         V9 = V( 9 )
-         T9 = TAU*DCONJG( V9 )
-         DO 380 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-  380    CONTINUE
-         GO TO 410
-  390    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*DCONJG( V1 )
-         V2 = V( 2 )
-         T2 = TAU*DCONJG( V2 )
-         V3 = V( 3 )
-         T3 = TAU*DCONJG( V3 )
-         V4 = V( 4 )
-         T4 = TAU*DCONJG( V4 )
-         V5 = V( 5 )
-         T5 = TAU*DCONJG( V5 )
-         V6 = V( 6 )
-         T6 = TAU*DCONJG( V6 )
-         V7 = V( 7 )
-         T7 = TAU*DCONJG( V7 )
-         V8 = V( 8 )
-         T8 = TAU*DCONJG( V8 )
-         V9 = V( 9 )
-         T9 = TAU*DCONJG( V9 )
-         V10 = V( 10 )
-         T10 = TAU*DCONJG( V10 )
-         DO 400 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 ) +
-     $            V10*C( J, 10 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-            C( J, 10 ) = C( J, 10 ) - SUM*T10
-  400    CONTINUE
-         GO TO 410
-      END IF
-  410 CONTINUE
-      RETURN
-*
-*     End of ZLARFX
-*
-      END
-      SUBROUTINE ZLARFG( N, ALPHA, X, INCX, TAU )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            INCX, N
-      COMPLEX*16         ALPHA, TAU
-*     ..
-*     .. Array Arguments ..
-      COMPLEX*16         X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZLARFG generates a complex elementary reflector H of order n, such
-*  that
-*
-*        H' * ( alpha ) = ( beta ),   H' * H = I.
-*             (   x   )   (   0  )
-*
-*  where alpha and beta are scalars, with beta real, and x is an
-*  (n-1)-element complex vector. H is represented in the form
-*
-*        H = I - tau * ( 1 ) * ( 1 v' ) ,
-*                      ( v )
-*
-*  where tau is a complex scalar and v is a complex (n-1)-element
-*  vector. Note that H is not hermitian.
-*
-*  If the elements of x are all zero and alpha is real, then tau = 0
-*  and H is taken to be the unit matrix.
-*
-*  Otherwise  1 <= real(tau) <= 2  and  abs(tau-1) <= 1 .
-*
-*  Arguments
-*  =========
-*
-*  N       (input) INTEGER
-*          The order of the elementary reflector.
-*
-*  ALPHA   (input/output) COMPLEX*16
-*          On entry, the value alpha.
-*          On exit, it is overwritten with the value beta.
-*
-*  X       (input/output) COMPLEX*16 array, dimension
-*                         (1+(N-2)*abs(INCX))
-*          On entry, the vector x.
-*          On exit, it is overwritten with the vector v.
-*
-*  INCX    (input) INTEGER
-*          The increment between elements of X. INCX <> 0.
-*
-*  TAU     (output) COMPLEX*16
-*          The value tau.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J, KNT
-      DOUBLE PRECISION   ALPHI, ALPHR, BETA, RSAFMN, SAFMIN, XNORM
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMCH, DLAPY3, DZNRM2
-      COMPLEX*16         ZLADIV
-      EXTERNAL           DLAMCH, DLAPY3, DZNRM2, ZLADIV
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, DBLE, DCMPLX, DIMAG, SIGN
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           ZDSCAL, ZSCAL
-*     ..
-*     .. Executable Statements ..
-*
-      IF( N.LE.0 ) THEN
-         TAU = ZERO
-         RETURN
-      END IF
-*
-      XNORM = DZNRM2( N-1, X, INCX )
-      ALPHR = DBLE( ALPHA )
-      ALPHI = DIMAG( ALPHA )
-*
-      IF( XNORM.EQ.ZERO .AND. ALPHI.EQ.ZERO ) THEN
-*
-*        H  =  I
-*
-         TAU = ZERO
-      ELSE
-*
-*        general case
-*
-         BETA = -SIGN( DLAPY3( ALPHR, ALPHI, XNORM ), ALPHR )
-         SAFMIN = DLAMCH( 'S' )
-         RSAFMN = ONE / SAFMIN
-*
-         IF( ABS( BETA ).LT.SAFMIN ) THEN
-*
-*           XNORM, BETA may be inaccurate; scale X and recompute them
-*
-            KNT = 0
-   10       CONTINUE
-            KNT = KNT + 1
-            CALL ZDSCAL( N-1, RSAFMN, X, INCX )
-            BETA = BETA*RSAFMN
-            ALPHI = ALPHI*RSAFMN
-            ALPHR = ALPHR*RSAFMN
-            IF( ABS( BETA ).LT.SAFMIN )
-     $         GO TO 10
-*
-*           New BETA is at most 1, at least SAFMIN
-*
-            XNORM = DZNRM2( N-1, X, INCX )
-            ALPHA = DCMPLX( ALPHR, ALPHI )
-            BETA = -SIGN( DLAPY3( ALPHR, ALPHI, XNORM ), ALPHR )
-            TAU = DCMPLX( ( BETA-ALPHR ) / BETA, -ALPHI / BETA )
-            ALPHA = ZLADIV( DCMPLX( ONE ), ALPHA-BETA )
-            CALL ZSCAL( N-1, ALPHA, X, INCX )
-*
-*           If ALPHA is subnormal, it may lose relative accuracy
-*
-            ALPHA = BETA
-            DO 20 J = 1, KNT
-               ALPHA = ALPHA*SAFMIN
-   20       CONTINUE
-         ELSE
-            TAU = DCMPLX( ( BETA-ALPHR ) / BETA, -ALPHI / BETA )
-            ALPHA = ZLADIV( DCMPLX( ONE ), ALPHA-BETA )
-            CALL ZSCAL( N-1, ALPHA, X, INCX )
-            ALPHA = BETA
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of ZLARFG
-*
-      END
-      SUBROUTINE DGEQPF( M, N, A, LDA, JPVT, TAU, WORK, INFO )
-*
-*  -- LAPACK test routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     March 31, 1993
-*
-*     .. Scalar Arguments ..
-      INTEGER            INFO, LDA, M, N
-*     ..
-*     .. Array Arguments ..
-      INTEGER            JPVT( * )
-      DOUBLE PRECISION   A( LDA, * ), TAU( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEQPF computes a QR factorization with column pivoting of a
-*  real M-by-N matrix A: A*P = Q*R.
-*
-*  Arguments
-*  =========
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix A. M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix A. N >= 0
-*
-*  A       (input/output) DOUBLE PRECISION array, dimension (LDA,N)
-*          On entry, the M-by-N matrix A.
-*          On exit, the upper triangle of the array contains the
-*          min(M,N)-by-N upper triangular matrix R; the elements
-*          below the diagonal, together with the array TAU,
-*          represent the orthogonal matrix Q as a product of
-*          min(m,n) elementary reflectors.
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A. LDA >= max(1,M).
-*
-*  JPVT    (input/output) INTEGER array, dimension (N)
-*          On entry, if JPVT(i) .ne. 0, the i-th column of A is permuted
-*          to the front of A*P (a leading column); if JPVT(i) = 0,
-*          the i-th column of A is a free column.
-*          On exit, if JPVT(i) = k, then the i-th column of A*P
-*          was the k-th column of A.
-*
-*  TAU     (output) DOUBLE PRECISION array, dimension (min(M,N))
-*          The scalar factors of the elementary reflectors.
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (3*N)
-*
-*  INFO    (output) INTEGER
-*          = 0:  successful exit
-*          < 0:  if INFO = -i, the i-th argument had an illegal value
-*
-*  Further Details
-*  ===============
-*
-*  The matrix Q is represented as a product of elementary reflectors
-*
-*     Q = H(1) H(2) . . . H(n)
-*
-*  Each H(i) has the form
-*
-*     H = I - tau * v * v'
-*
-*  where tau is a real scalar, and v is a real vector with
-*  v(1:i-1) = 0 and v(i) = 1; v(i+1:m) is stored on exit in A(i+1:m,i).
-*
-*  The matrix P is represented in jpvt as follows: If
-*     jpvt(j) = i
-*  then the jth column of P is the ith canonical unit vector.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D+0, ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            I, ITEMP, J, MA, MN, PVT
-      DOUBLE PRECISION   AII, TEMP, TEMP2
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEQR2, DLARF, DLARFG, DORM2R, DSWAP, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, MIN, SQRT
-*     ..
-*     .. External Functions ..
-      INTEGER            IDAMAX
-      DOUBLE PRECISION   DNRM2
-      EXTERNAL           IDAMAX, DNRM2
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      IF( M.LT.0 ) THEN
-         INFO = -1
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -2
-      ELSE IF( LDA.LT.MAX( 1, M ) ) THEN
-         INFO = -4
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DGEQPF', -INFO )
-         RETURN
-      END IF
-*
-      MN = MIN( M, N )
-*
-*     Move initial columns up front
-*
-      ITEMP = 1
-      DO 10 I = 1, N
-         IF( JPVT( I ).NE.0 ) THEN
-            IF( I.NE.ITEMP ) THEN
-               CALL DSWAP( M, A( 1, I ), 1, A( 1, ITEMP ), 1 )
-               JPVT( I ) = JPVT( ITEMP )
-               JPVT( ITEMP ) = I
-            ELSE
-               JPVT( I ) = I
-            END IF
-            ITEMP = ITEMP + 1
-         ELSE
-            JPVT( I ) = I
-         END IF
-   10 CONTINUE
-      ITEMP = ITEMP - 1
-*
-*     Compute the QR factorization and update remaining columns
-*
-      IF( ITEMP.GT.0 ) THEN
-         MA = MIN( ITEMP, M )
-         CALL DGEQR2( M, MA, A, LDA, TAU, WORK, INFO )
-         IF( MA.LT.N ) THEN
-            CALL DORM2R( 'Left', 'Transpose', M, N-MA, MA, A, LDA, TAU,
-     $                   A( 1, MA+1 ), LDA, WORK, INFO )
-         END IF
-      END IF
-*
-      IF( ITEMP.LT.MN ) THEN
-*
-*        Initialize partial column norms. The first n entries of
-*        work store the exact column norms.
-*
-         DO 20 I = ITEMP + 1, N
-            WORK( I ) = DNRM2( M-ITEMP, A( ITEMP+1, I ), 1 )
-            WORK( N+I ) = WORK( I )
-   20    CONTINUE
-*
-*        Compute factorization
-*
-         DO 40 I = ITEMP + 1, MN
-*
-*           Determine ith pivot column and swap if necessary
-*
-            PVT = ( I-1 ) + IDAMAX( N-I+1, WORK( I ), 1 )
-*
-            IF( PVT.NE.I ) THEN
-               CALL DSWAP( M, A( 1, PVT ), 1, A( 1, I ), 1 )
-               ITEMP = JPVT( PVT )
-               JPVT( PVT ) = JPVT( I )
-               JPVT( I ) = ITEMP
-               WORK( PVT ) = WORK( I )
-               WORK( N+PVT ) = WORK( N+I )
-            END IF
-*
-*           Generate elementary reflector H(i)
-*
-            IF( I.LT.M ) THEN
-               CALL DLARFG( M-I+1, A( I, I ), A( I+1, I ), 1, TAU( I ) )
-            ELSE
-               CALL DLARFG( 1, A( M, M ), A( M, M ), 1, TAU( M ) )
-            END IF
-*
-            IF( I.LT.N ) THEN
-*
-*              Apply H(i) to A(i:m,i+1:n) from the left
-*
-               AII = A( I, I )
-               A( I, I ) = ONE
-               CALL DLARF( 'LEFT', M-I+1, N-I, A( I, I ), 1, TAU( I ),
-     $                     A( I, I+1 ), LDA, WORK( 2*N+1 ) )
-               A( I, I ) = AII
-            END IF
-*
-*           Update partial column norms
-*
-            DO 30 J = I + 1, N
-               IF( WORK( J ).NE.ZERO ) THEN
-                  TEMP = ONE - ( ABS( A( I, J ) ) / WORK( J ) )**2
-                  TEMP = MAX( TEMP, ZERO )
-                  TEMP2 = ONE + 0.05D0*TEMP*
-     $                    ( WORK( J ) / WORK( N+J ) )**2
-                  IF( TEMP2.EQ.ONE ) THEN
-                     IF( M-I.GT.0 ) THEN
-                        WORK( J ) = DNRM2( M-I, A( I+1, J ), 1 )
-                        WORK( N+J ) = WORK( J )
-                     ELSE
-                        WORK( J ) = ZERO
-                        WORK( N+J ) = ZERO
-                     END IF
-                  ELSE
-                     WORK( J ) = WORK( J )*SQRT( TEMP )
-                  END IF
-               END IF
-   30       CONTINUE
-*
-   40    CONTINUE
-      END IF
-      RETURN
-*
-*     End of DGEQPF
-*
-      END
-      double precision function dnrm2 ( n, dx, incx)
-      integer i, incx, ix, j, n, next
-      double precision   dx(1), cutlo, cuthi, hitest, sum, xmax,zero,one
-      data   zero, one /0.0d0, 1.0d0/
-c
-c     euclidean norm of the n-vector stored in dx() with storage
-c     increment incx .
-c     if    n .le. 0 return with result = 0.
-c     if n .ge. 1 then incx must be .ge. 1
-c
-c           c.l.lawson, 1978 jan 08
-c     modified to correct problem with negative increment, 8/21/90.
-c     modified to correct failure to update ix, 1/25/92.
-c
-c     four phase method     using two built-in constants that are
-c     hopefully applicable to all machines.
-c         cutlo = maximum of  dsqrt(u/eps)  over all known machines.
-c         cuthi = minimum of  dsqrt(v)      over all known machines.
-c     where
-c         eps = smallest no. such that eps + 1. .gt. 1.
-c         u   = smallest positive no.   (underflow limit)
-c         v   = largest  no.            (overflow  limit)
-c
-c     brief outline of algorithm..
-c
-c     phase 1    scans zero components.
-c     move to phase 2 when a component is nonzero and .le. cutlo
-c     move to phase 3 when a component is .gt. cutlo
-c     move to phase 4 when a component is .ge. cuthi/m
-c     where m = n for x() real and m = 2*n for complex.
-c
-c     values for cutlo and cuthi..
-c     from the environmental parameters listed in the imsl converter
-c     document the limiting values are as follows..
-c     cutlo, s.p.   u/eps = 2**(-102) for  honeywell.  close seconds are
-c                   univac and dec at 2**(-103)
-c                   thus cutlo = 2**(-51) = 4.44089e-16
-c     cuthi, s.p.   v = 2**127 for univac, honeywell, and dec.
-c                   thus cuthi = 2**(63.5) = 1.30438e19
-c     cutlo, d.p.   u/eps = 2**(-67) for honeywell and dec.
-c                   thus cutlo = 2**(-33.5) = 8.23181d-11
-c     cuthi, d.p.   same as s.p.  cuthi = 1.30438d19
-c     data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c     data cutlo, cuthi / 4.441e-16,  1.304e19 /
-      data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c
-      if(n .gt. 0) go to 10
-         dnrm2  = zero
-         go to 300
-c
-   10 assign 30 to next
-      sum = zero
-      i = 1
-      if( incx .lt. 0 )i = (-n+1)*incx + 1
-      ix = 1
-c                                                 begin main loop
-   20    go to next,(30, 50, 70, 110)
-   30 if( dabs(dx(i)) .gt. cutlo) go to 85
-      assign 50 to next
-      xmax = zero
-c
-c                        phase 1.  sum is zero
-c
-   50 if( dx(i) .eq. zero) go to 200
-      if( dabs(dx(i)) .gt. cutlo) go to 85
-c
-c                                prepare for phase 2.
-      assign 70 to next
-      go to 105
-c
-c                                prepare for phase 4.
-c
-  100 continue
-      ix = j
-      assign 110 to next
-      sum = (sum / dx(i)) / dx(i)
-  105 xmax = dabs(dx(i))
-      go to 115
-c
-c                   phase 2.  sum is small.
-c                             scale to avoid destructive underflow.
-c
-   70 if( dabs(dx(i)) .gt. cutlo ) go to 75
-c
-c                     common code for phases 2 and 4.
-c                     in phase 4 sum is large.  scale to avoid overflow.
-c
-  110 if( dabs(dx(i)) .le. xmax ) go to 115
-         sum = one + sum * (xmax / dx(i))**2
-         xmax = dabs(dx(i))
-         go to 200
-c
-  115 sum = sum + (dx(i)/xmax)**2
-      go to 200
-c
-c
-c                  prepare for phase 3.
-c
-   75 sum = (sum * xmax) * xmax
-c
-c
-c     for real or d.p. set hitest = cuthi/n
-c     for complex      set hitest = cuthi/(2*n)
-c
-   85 hitest = cuthi/float( n )
-c
-c                   phase 3.  sum is mid-range.  no scaling.
-c
-      do 95 j = ix,n
-      if(dabs(dx(i)) .ge. hitest) go to 100
-         sum = sum + dx(i)**2
-         i = i + incx
-   95 continue
-      dnrm2 = dsqrt( sum )
-      go to 300
-c
-  200 continue
-      ix = ix + 1
-      i = i + incx
-      if( ix .le. n ) go to 20
-c
-c              end of main loop.
-c
-c              compute square root and adjust for scaling.
-c
-      dnrm2 = xmax * dsqrt(sum)
-  300 continue
-      return
-      end
-      SUBROUTINE DLARFX( SIDE, M, N, V, TAU, C, LDC, WORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE
-      INTEGER            LDC, M, N
-      DOUBLE PRECISION   TAU
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   C( LDC, * ), V( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFX applies a real elementary reflector H to a real m by n
-*  matrix C, from either the left or the right. H is represented in the
-*  form
-*
-*        H = I - tau * v * v'
-*
-*  where tau is a real scalar and v is a real vector.
-*
-*  If tau = 0, then H is taken to be the unit matrix
-*
-*  This version uses inline code if H has order < 11.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': form  H * C
-*          = 'R': form  C * H
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  V       (input) DOUBLE PRECISION array, dimension (M) if SIDE = 'L'
-*                                     or (N) if SIDE = 'R'
-*          The vector v in the representation of H.
-*
-*  TAU     (input) DOUBLE PRECISION
-*          The value tau in the representation of H.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by the matrix H * C if SIDE = 'L',
-*          or C * H if SIDE = 'R'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDA >= (1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension
-*                      (N) if SIDE = 'L'
-*                      or (M) if SIDE = 'R'
-*          WORK is not referenced if H has order < 11.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D+0, ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J
-      DOUBLE PRECISION   SUM, T1, T10, T2, T3, T4, T5, T6, T7, T8, T9,
-     $                   V1, V10, V2, V3, V4, V5, V6, V7, V8, V9
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEMV, DGER
-*     ..
-*     .. Executable Statements ..
-*
-      IF( TAU.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*        Form  H * C, where H has order m.
-*
-         GO TO ( 10, 30, 50, 70, 90, 110, 130, 150,
-     $           170, 190 )M
-*
-*        Code for general M
-*
-*        w := C'*v
-*
-         CALL DGEMV( 'Transpose', M, N, ONE, C, LDC, V, 1, ZERO, WORK,
-     $               1 )
-*
-*        C := C - tau * v * w'
-*
-         CALL DGER( M, N, -TAU, V, 1, WORK, 1, C, LDC )
-         GO TO 410
-   10    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*V( 1 )
-         DO 20 J = 1, N
-            C( 1, J ) = T1*C( 1, J )
-   20    CONTINUE
-         GO TO 410
-   30    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         DO 40 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-   40    CONTINUE
-         GO TO 410
-   50    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         DO 60 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-   60    CONTINUE
-         GO TO 410
-   70    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         DO 80 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-   80    CONTINUE
-         GO TO 410
-   90    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         DO 100 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-  100    CONTINUE
-         GO TO 410
-  110    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         DO 120 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-  120    CONTINUE
-         GO TO 410
-  130    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         DO 140 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-  140    CONTINUE
-         GO TO 410
-  150    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         DO 160 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-  160    CONTINUE
-         GO TO 410
-  170    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         DO 180 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-  180    CONTINUE
-         GO TO 410
-  190    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         V10 = V( 10 )
-         T10 = TAU*V10
-         DO 200 J = 1, N
-            SUM = V1*C( 1, J ) + V2*C( 2, J ) + V3*C( 3, J ) +
-     $            V4*C( 4, J ) + V5*C( 5, J ) + V6*C( 6, J ) +
-     $            V7*C( 7, J ) + V8*C( 8, J ) + V9*C( 9, J ) +
-     $            V10*C( 10, J )
-            C( 1, J ) = C( 1, J ) - SUM*T1
-            C( 2, J ) = C( 2, J ) - SUM*T2
-            C( 3, J ) = C( 3, J ) - SUM*T3
-            C( 4, J ) = C( 4, J ) - SUM*T4
-            C( 5, J ) = C( 5, J ) - SUM*T5
-            C( 6, J ) = C( 6, J ) - SUM*T6
-            C( 7, J ) = C( 7, J ) - SUM*T7
-            C( 8, J ) = C( 8, J ) - SUM*T8
-            C( 9, J ) = C( 9, J ) - SUM*T9
-            C( 10, J ) = C( 10, J ) - SUM*T10
-  200    CONTINUE
-         GO TO 410
-      ELSE
-*
-*        Form  C * H, where H has order n.
-*
-         GO TO ( 210, 230, 250, 270, 290, 310, 330, 350,
-     $           370, 390 )N
-*
-*        Code for general N
-*
-*        w := C * v
-*
-         CALL DGEMV( 'No transpose', M, N, ONE, C, LDC, V, 1, ZERO,
-     $               WORK, 1 )
-*
-*        C := C - tau * w * v'
-*
-         CALL DGER( M, N, -TAU, WORK, 1, V, 1, C, LDC )
-         GO TO 410
-  210    CONTINUE
-*
-*        Special code for 1 x 1 Householder
-*
-         T1 = ONE - TAU*V( 1 )*V( 1 )
-         DO 220 J = 1, M
-            C( J, 1 ) = T1*C( J, 1 )
-  220    CONTINUE
-         GO TO 410
-  230    CONTINUE
-*
-*        Special code for 2 x 2 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         DO 240 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-  240    CONTINUE
-         GO TO 410
-  250    CONTINUE
-*
-*        Special code for 3 x 3 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         DO 260 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-  260    CONTINUE
-         GO TO 410
-  270    CONTINUE
-*
-*        Special code for 4 x 4 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         DO 280 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-  280    CONTINUE
-         GO TO 410
-  290    CONTINUE
-*
-*        Special code for 5 x 5 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         DO 300 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-  300    CONTINUE
-         GO TO 410
-  310    CONTINUE
-*
-*        Special code for 6 x 6 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         DO 320 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-  320    CONTINUE
-         GO TO 410
-  330    CONTINUE
-*
-*        Special code for 7 x 7 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         DO 340 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-  340    CONTINUE
-         GO TO 410
-  350    CONTINUE
-*
-*        Special code for 8 x 8 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         DO 360 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-  360    CONTINUE
-         GO TO 410
-  370    CONTINUE
-*
-*        Special code for 9 x 9 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         DO 380 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-  380    CONTINUE
-         GO TO 410
-  390    CONTINUE
-*
-*        Special code for 10 x 10 Householder
-*
-         V1 = V( 1 )
-         T1 = TAU*V1
-         V2 = V( 2 )
-         T2 = TAU*V2
-         V3 = V( 3 )
-         T3 = TAU*V3
-         V4 = V( 4 )
-         T4 = TAU*V4
-         V5 = V( 5 )
-         T5 = TAU*V5
-         V6 = V( 6 )
-         T6 = TAU*V6
-         V7 = V( 7 )
-         T7 = TAU*V7
-         V8 = V( 8 )
-         T8 = TAU*V8
-         V9 = V( 9 )
-         T9 = TAU*V9
-         V10 = V( 10 )
-         T10 = TAU*V10
-         DO 400 J = 1, M
-            SUM = V1*C( J, 1 ) + V2*C( J, 2 ) + V3*C( J, 3 ) +
-     $            V4*C( J, 4 ) + V5*C( J, 5 ) + V6*C( J, 6 ) +
-     $            V7*C( J, 7 ) + V8*C( J, 8 ) + V9*C( J, 9 ) +
-     $            V10*C( J, 10 )
-            C( J, 1 ) = C( J, 1 ) - SUM*T1
-            C( J, 2 ) = C( J, 2 ) - SUM*T2
-            C( J, 3 ) = C( J, 3 ) - SUM*T3
-            C( J, 4 ) = C( J, 4 ) - SUM*T4
-            C( J, 5 ) = C( J, 5 ) - SUM*T5
-            C( J, 6 ) = C( J, 6 ) - SUM*T6
-            C( J, 7 ) = C( J, 7 ) - SUM*T7
-            C( J, 8 ) = C( J, 8 ) - SUM*T8
-            C( J, 9 ) = C( J, 9 ) - SUM*T9
-            C( J, 10 ) = C( J, 10 ) - SUM*T10
-  400    CONTINUE
-         GO TO 410
-      END IF
-  410 CONTINUE
-      RETURN
-*
-*     End of DLARFX
-*
-      END
-      SUBROUTINE DLARFG( N, ALPHA, X, INCX, TAU )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            INCX, N
-      DOUBLE PRECISION   ALPHA, TAU
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFG generates a real elementary reflector H of order n, such
-*  that
-*
-*        H * ( alpha ) = ( beta ),   H' * H = I.
-*            (   x   )   (   0  )
-*
-*  where alpha and beta are scalars, and x is an (n-1)-element real
-*  vector. H is represented in the form
-*
-*        H = I - tau * ( 1 ) * ( 1 v' ) ,
-*                      ( v )
-*
-*  where tau is a real scalar and v is a real (n-1)-element
-*  vector.
-*
-*  If the elements of x are all zero, then tau = 0 and H is taken to be
-*  the unit matrix.
-*
-*  Otherwise  1 <= tau <= 2.
-*
-*  Arguments
-*  =========
-*
-*  N       (input) INTEGER
-*          The order of the elementary reflector.
-*
-*  ALPHA   (input/output) DOUBLE PRECISION
-*          On entry, the value alpha.
-*          On exit, it is overwritten with the value beta.
-*
-*  X       (input/output) DOUBLE PRECISION array, dimension
-*                         (1+(N-2)*abs(INCX))
-*          On entry, the vector x.
-*          On exit, it is overwritten with the vector v.
-*
-*  INCX    (input) INTEGER
-*          The increment between elements of X. INCX <> 0.
-*
-*  TAU     (output) DOUBLE PRECISION
-*          The value tau.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            J, KNT
-      DOUBLE PRECISION   BETA, RSAFMN, SAFMIN, XNORM
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMCH, DLAPY2, DNRM2
-      EXTERNAL           DLAMCH, DLAPY2, DNRM2
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, SIGN
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DSCAL
-*     ..
-*     .. Executable Statements ..
-*
-      IF( N.LE.1 ) THEN
-         TAU = ZERO
-         RETURN
-      END IF
-*
-      XNORM = DNRM2( N-1, X, INCX )
-*
-      IF( XNORM.EQ.ZERO ) THEN
-*
-*        H  =  I
-*
-         TAU = ZERO
-      ELSE
-*
-*        general case
-*
-         BETA = -SIGN( DLAPY2( ALPHA, XNORM ), ALPHA )
-         SAFMIN = DLAMCH( 'S' )
-         IF( ABS( BETA ).LT.SAFMIN ) THEN
-*
-*           XNORM, BETA may be inaccurate; scale X and recompute them
-*
-            RSAFMN = ONE / SAFMIN
-            KNT = 0
-   10       CONTINUE
-            KNT = KNT + 1
-            CALL DSCAL( N-1, RSAFMN, X, INCX )
-            BETA = BETA*RSAFMN
-            ALPHA = ALPHA*RSAFMN
-            IF( ABS( BETA ).LT.SAFMIN )
-     $         GO TO 10
-*
-*           New BETA is at most 1, at least SAFMIN
-*
-            XNORM = DNRM2( N-1, X, INCX )
-            BETA = -SIGN( DLAPY2( ALPHA, XNORM ), ALPHA )
-            TAU = ( BETA-ALPHA ) / BETA
-            CALL DSCAL( N-1, ONE / ( ALPHA-BETA ), X, INCX )
-*
-*           If ALPHA is subnormal, it may lose relative accuracy
-*
-            ALPHA = BETA
-            DO 20 J = 1, KNT
-               ALPHA = ALPHA*SAFMIN
-   20       CONTINUE
-         ELSE
-            TAU = ( BETA-ALPHA ) / BETA
-            CALL DSCAL( N-1, ONE / ( ALPHA-BETA ), X, INCX )
-            ALPHA = BETA
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DLARFG
-*
-      END
-      SUBROUTINE XERBLA ( SRNAME, INFO )
-*     ..    Scalar Arguments ..
-      INTEGER            INFO
-      CHARACTER*6        SRNAME
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  XERBLA  is an error handler for the Level 2 BLAS routines.
-*
-*  It is called by the Level 2 BLAS routines if an input parameter is
-*  invalid.
-*
-*  Installers should consider modifying the STOP statement in order to
-*  call system-specific exception-handling facilities.
-*
-*  Parameters
-*  ==========
-*
-*  SRNAME - CHARACTER*6.
-*           On entry, SRNAME specifies the name of the routine which
-*           called XERBLA.
-*
-*  INFO   - INTEGER.
-*           On entry, INFO specifies the position of the invalid
-*           parameter in the parameter-list of the calling routine.
-*
-*
-*  Auxiliary routine for Level 2 Blas.
-*
-*  Written on 20-July-1986.
-*
-*     .. Executable Statements ..
-*
-      WRITE (*,99999) SRNAME, INFO
-*
-      STOP
-*
-99999 FORMAT ( ' ** On entry to ', A6, ' parameter number ', I2,
-     $         ' had an illegal value' )
-*
-*     End of XERBLA.
-*
-      END
-      LOGICAL FUNCTION LSAME ( CA, CB )
-*     .. Scalar Arguments ..
-      CHARACTER*1            CA, CB
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  LSAME  tests if CA is the same letter as CB regardless of case.
-*  CB is assumed to be an upper case letter. LSAME returns .TRUE. if
-*  CA is either the same as CB or the equivalent lower case letter.
-*
-*  N.B. This version of the routine is only correct for ASCII code.
-*       Installers must modify the routine for other character-codes.
-*
-*       For EBCDIC systems the constant IOFF must be changed to -64.
-*       For CDC systems using 6-12 bit representations, the system-
-*       specific code in comments must be activated.
-*
-*  Parameters
-*  ==========
-*
-*  CA     - CHARACTER*1
-*  CB     - CHARACTER*1
-*           On entry, CA and CB specify characters to be compared.
-*           Unchanged on exit.
-*
-*
-*  Auxiliary routine for Level 2 Blas.
-*
-*  -- Written on 20-July-1986
-*     Richard Hanson, Sandia National Labs.
-*     Jeremy Du Croz, Nag Central Office.
-*
-*     .. Parameters ..
-      INTEGER                IOFF
-      PARAMETER            ( IOFF=32 )
-*     .. Intrinsic Functions ..
-      INTRINSIC              ICHAR
-*     .. Executable Statements ..
-*
-*     Test if the characters are equal
-*
-      LSAME = CA .EQ. CB
-*
-*     Now test for equivalence
-*
-      IF ( .NOT.LSAME ) THEN
-         LSAME = ICHAR(CA) - IOFF .EQ. ICHAR(CB)
-      END IF
-*
-      RETURN
-*
-*  The following comments contain code for CDC systems using 6-12 bit
-*  representations.
-*
-*     .. Parameters ..
-*     INTEGER                ICIRFX
-*     PARAMETER            ( ICIRFX=62 )
-*     .. Scalar Arguments ..
-*     CHARACTER*1            CB
-*     .. Array Arguments ..
-*     CHARACTER*1            CA(*)
-*     .. Local Scalars ..
-*     INTEGER                IVAL
-*     .. Intrinsic Functions ..
-*     INTRINSIC              ICHAR, CHAR
-*     .. Executable Statements ..
-*
-*     See if the first character in string CA equals string CB.
-*
-*     LSAME = CA(1) .EQ. CB .AND. CA(1) .NE. CHAR(ICIRFX)
-*
-*     IF (LSAME) RETURN
-*
-*     The characters are not identical. Now check them for equivalence.
-*     Look for the 'escape' character, circumflex, followed by the
-*     letter.
-*
-*     IVAL = ICHAR(CA(2))
-*     IF (IVAL.GE.ICHAR('A') .AND. IVAL.LE.ICHAR('Z')) THEN
-*        LSAME = CA(1) .EQ. CHAR(ICIRFX) .AND. CA(2) .EQ. CB
-*     END IF
-*
-*     RETURN
-*
-*     End of LSAME.
-*
-      END
-      SUBROUTINE ZGEMV ( TRANS, M, N, ALPHA, A, LDA, X, INCX,
-     $                   BETA, Y, INCY )
-*     .. Scalar Arguments ..
-      COMPLEX*16         ALPHA, BETA
-      INTEGER            INCX, INCY, LDA, M, N
-      CHARACTER*1        TRANS
-*     .. Array Arguments ..
-      COMPLEX*16         A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZGEMV  performs one of the matrix-vector operations
-*
-*     y := alpha*A*x + beta*y,   or   y := alpha*A'*x + beta*y,   or
-*
-*     y := alpha*conjg( A' )*x + beta*y,
-*
-*  where alpha and beta are scalars, x and y are vectors and A is an
-*  m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the operation to be performed as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   y := alpha*A*x + beta*y.
-*
-*              TRANS = 'T' or 't'   y := alpha*A'*x + beta*y.
-*
-*              TRANS = 'C' or 'c'   y := alpha*conjg( A' )*x + beta*y.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - COMPLEX*16      .
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  A      - COMPLEX*16       array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*  X      - COMPLEX*16       array of DIMENSION at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ) otherwise.
-*           Before entry, the incremented array X must contain the
-*           vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  BETA   - COMPLEX*16      .
-*           On entry, BETA specifies the scalar beta. When BETA is
-*           supplied as zero then Y need not be set on input.
-*           Unchanged on exit.
-*
-*  Y      - COMPLEX*16       array of DIMENSION at least
-*           ( 1 + ( m - 1 )*abs( INCY ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ) otherwise.
-*           Before entry with BETA non-zero, the incremented array Y
-*           must contain the vector y. On exit, Y is overwritten by the
-*           updated vector y.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      COMPLEX*16         ONE
-      PARAMETER        ( ONE  = ( 1.0D+0, 0.0D+0 ) )
-      COMPLEX*16         ZERO
-      PARAMETER        ( ZERO = ( 0.0D+0, 0.0D+0 ) )
-*     .. Local Scalars ..
-      COMPLEX*16         TEMP
-      INTEGER            I, INFO, IX, IY, J, JX, JY, KX, KY, LENX, LENY
-      LOGICAL            NOCONJ
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG, MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 1
-      ELSE IF( M.LT.0 )THEN
-         INFO = 2
-      ELSE IF( N.LT.0 )THEN
-         INFO = 3
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 11
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'ZGEMV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.
-     $    ( ( ALPHA.EQ.ZERO ).AND.( BETA.EQ.ONE ) ) )
-     $   RETURN
-*
-      NOCONJ = LSAME( TRANS, 'T' )
-*
-*     Set  LENX  and  LENY, the lengths of the vectors x and y, and set
-*     up the start points in  X  and  Y.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-         LENX = N
-         LENY = M
-      ELSE
-         LENX = M
-         LENY = N
-      END IF
-      IF( INCX.GT.0 )THEN
-         KX = 1
-      ELSE
-         KX = 1 - ( LENX - 1 )*INCX
-      END IF
-      IF( INCY.GT.0 )THEN
-         KY = 1
-      ELSE
-         KY = 1 - ( LENY - 1 )*INCY
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-*     First form  y := beta*y.
-*
-      IF( BETA.NE.ONE )THEN
-         IF( INCY.EQ.1 )THEN
-            IF( BETA.EQ.ZERO )THEN
-               DO 10, I = 1, LENY
-                  Y( I ) = ZERO
-   10          CONTINUE
-            ELSE
-               DO 20, I = 1, LENY
-                  Y( I ) = BETA*Y( I )
-   20          CONTINUE
-            END IF
-         ELSE
-            IY = KY
-            IF( BETA.EQ.ZERO )THEN
-               DO 30, I = 1, LENY
-                  Y( IY ) = ZERO
-                  IY      = IY   + INCY
-   30          CONTINUE
-            ELSE
-               DO 40, I = 1, LENY
-                  Y( IY ) = BETA*Y( IY )
-                  IY      = IY           + INCY
-   40          CONTINUE
-            END IF
-         END IF
-      END IF
-      IF( ALPHA.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  y := alpha*A*x + y.
-*
-         JX = KX
-         IF( INCY.EQ.1 )THEN
-            DO 60, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  DO 50, I = 1, M
-                     Y( I ) = Y( I ) + TEMP*A( I, J )
-   50             CONTINUE
-               END IF
-               JX = JX + INCX
-   60       CONTINUE
-         ELSE
-            DO 80, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  IY   = KY
-                  DO 70, I = 1, M
-                     Y( IY ) = Y( IY ) + TEMP*A( I, J )
-                     IY      = IY      + INCY
-   70             CONTINUE
-               END IF
-               JX = JX + INCX
-   80       CONTINUE
-         END IF
-      ELSE
-*
-*        Form  y := alpha*A'*x + y  or  y := alpha*conjg( A' )*x + y.
-*
-         JY = KY
-         IF( INCX.EQ.1 )THEN
-            DO 110, J = 1, N
-               TEMP = ZERO
-               IF( NOCONJ )THEN
-                  DO 90, I = 1, M
-                     TEMP = TEMP + A( I, J )*X( I )
-   90             CONTINUE
-               ELSE
-                  DO 100, I = 1, M
-                     TEMP = TEMP + DCONJG( A( I, J ) )*X( I )
-  100             CONTINUE
-               END IF
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  110       CONTINUE
-         ELSE
-            DO 140, J = 1, N
-               TEMP = ZERO
-               IX   = KX
-               IF( NOCONJ )THEN
-                  DO 120, I = 1, M
-                     TEMP = TEMP + A( I, J )*X( IX )
-                     IX   = IX   + INCX
-  120             CONTINUE
-               ELSE
-                  DO 130, I = 1, M
-                     TEMP = TEMP + DCONJG( A( I, J ) )*X( IX )
-                     IX   = IX   + INCX
-  130             CONTINUE
-               END IF
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  140       CONTINUE
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of ZGEMV .
-*
-      END
-      subroutine  zscal(n,za,zx,incx)
-c
-c     scales a vector by a constant.
-c     jack dongarra, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double complex za,zx(1)
-      integer i,incx,ix,n
-c
-      if(n.le.0)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      do 10 i = 1,n
-        zx(ix) = za*zx(ix)
-        ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-   20 do 30 i = 1,n
-        zx(i) = za*zx(i)
-   30 continue
-      return
-      end
-      subroutine  zdscal(n,da,zx,incx)
-c
-c     scales a vector by a constant.
-c     jack dongarra, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double complex zx(1)
-      double precision da
-      integer i,incx,ix,n
-c
-      if(n.le.0)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      do 10 i = 1,n
-        zx(ix) = dcmplx(da,0.0d0)*zx(ix)
-        ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-   20 do 30 i = 1,n
-        zx(i) = dcmplx(da,0.0d0)*zx(i)
-   30 continue
-      return
-      end
-      subroutine  dswap (n,dx,incx,dy,incy)
-c
-c     interchanges two vectors.
-c     uses unrolled loops for increments equal one.
-c     jack dongarra, linpack, 3/11/78.
-c
-      double precision dx(1),dy(1),dtemp
-      integer i,incx,incy,ix,iy,m,mp1,n
-c
-      if(n.le.0)return
-      if(incx.eq.1.and.incy.eq.1)go to 20
-c
-c       code for unequal increments or equal increments not equal
-c         to 1
-c
-      ix = 1
-      iy = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      if(incy.lt.0)iy = (-n+1)*incy + 1
-      do 10 i = 1,n
-        dtemp = dx(ix)
-        dx(ix) = dy(iy)
-        dy(iy) = dtemp
-        ix = ix + incx
-        iy = iy + incy
-   10 continue
-      return
-c
-c       code for both increments equal to 1
-c
-c
-c       clean-up loop
-c
-   20 m = mod(n,3)
-      if( m .eq. 0 ) go to 40
-      do 30 i = 1,m
-        dtemp = dx(i)
-        dx(i) = dy(i)
-        dy(i) = dtemp
-   30 continue
-      if( n .lt. 3 ) return
-   40 mp1 = m + 1
-      do 50 i = mp1,n,3
-        dtemp = dx(i)
-        dx(i) = dy(i)
-        dy(i) = dtemp
-        dtemp = dx(i + 1)
-        dx(i + 1) = dy(i + 1)
-        dy(i + 1) = dtemp
-        dtemp = dx(i + 2)
-        dx(i + 2) = dy(i + 2)
-        dy(i + 2) = dtemp
-   50 continue
-      return
-      end
-      SUBROUTINE DGER  ( M, N, ALPHA, X, INCX, Y, INCY, A, LDA )
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   ALPHA
-      INTEGER            INCX, INCY, LDA, M, N
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGER   performs the rank 1 operation
-*
-*     A := alpha*x*y' + A,
-*
-*  where alpha is a scalar, x is an m element vector, y is an n element
-*  vector and A is an m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the m
-*           element vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  Y      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ).
-*           Before entry, the incremented array Y must contain the n
-*           element vector y.
-*           Unchanged on exit.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients. On exit, A is
-*           overwritten by the updated matrix.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER        ( ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, J, JY, KX
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( M.LT.0 )THEN
-         INFO = 1
-      ELSE IF( N.LT.0 )THEN
-         INFO = 2
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 5
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 7
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 9
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DGER  ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.( ALPHA.EQ.ZERO ) )
-     $   RETURN
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( INCY.GT.0 )THEN
-         JY = 1
-      ELSE
-         JY = 1 - ( N - 1 )*INCY
-      END IF
-      IF( INCX.EQ.1 )THEN
-         DO 20, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*Y( JY )
-               DO 10, I = 1, M
-                  A( I, J ) = A( I, J ) + X( I )*TEMP
-   10          CONTINUE
-            END IF
-            JY = JY + INCY
-   20    CONTINUE
-      ELSE
-         IF( INCX.GT.0 )THEN
-            KX = 1
-         ELSE
-            KX = 1 - ( M - 1 )*INCX
-         END IF
-         DO 40, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*Y( JY )
-               IX   = KX
-               DO 30, I = 1, M
-                  A( I, J ) = A( I, J ) + X( IX )*TEMP
-                  IX        = IX        + INCX
-   30          CONTINUE
-            END IF
-            JY = JY + INCY
-   40    CONTINUE
-      END IF
-*
-      RETURN
-*
-*     End of DGER  .
-*
-      END
-      SUBROUTINE DGEMV ( TRANS, M, N, ALPHA, A, LDA, X, INCX,
-     $                   BETA, Y, INCY )
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   ALPHA, BETA
-      INTEGER            INCX, INCY, LDA, M, N
-      CHARACTER*1        TRANS
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEMV  performs one of the matrix-vector operations
-*
-*     y := alpha*A*x + beta*y,   or   y := alpha*A'*x + beta*y,
-*
-*  where alpha and beta are scalars, x and y are vectors and A is an
-*  m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the operation to be performed as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   y := alpha*A*x + beta*y.
-*
-*              TRANS = 'T' or 't'   y := alpha*A'*x + beta*y.
-*
-*              TRANS = 'C' or 'c'   y := alpha*A'*x + beta*y.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of DIMENSION at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ) otherwise.
-*           Before entry, the incremented array X must contain the
-*           vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  BETA   - DOUBLE PRECISION.
-*           On entry, BETA specifies the scalar beta. When BETA is
-*           supplied as zero then Y need not be set on input.
-*           Unchanged on exit.
-*
-*  Y      - DOUBLE PRECISION array of DIMENSION at least
-*           ( 1 + ( m - 1 )*abs( INCY ) ) when TRANS = 'N' or 'n'
-*           and at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ) otherwise.
-*           Before entry with BETA non-zero, the incremented array Y
-*           must contain the vector y. On exit, Y is overwritten by the
-*           updated vector y.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE         , ZERO
-      PARAMETER        ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, IY, J, JX, JY, KX, KY, LENX, LENY
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 1
-      ELSE IF( M.LT.0 )THEN
-         INFO = 2
-      ELSE IF( N.LT.0 )THEN
-         INFO = 3
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 11
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DGEMV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.
-     $    ( ( ALPHA.EQ.ZERO ).AND.( BETA.EQ.ONE ) ) )
-     $   RETURN
-*
-*     Set  LENX  and  LENY, the lengths of the vectors x and y, and set
-*     up the start points in  X  and  Y.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-         LENX = N
-         LENY = M
-      ELSE
-         LENX = M
-         LENY = N
-      END IF
-      IF( INCX.GT.0 )THEN
-         KX = 1
-      ELSE
-         KX = 1 - ( LENX - 1 )*INCX
-      END IF
-      IF( INCY.GT.0 )THEN
-         KY = 1
-      ELSE
-         KY = 1 - ( LENY - 1 )*INCY
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-*     First form  y := beta*y.
-*
-      IF( BETA.NE.ONE )THEN
-         IF( INCY.EQ.1 )THEN
-            IF( BETA.EQ.ZERO )THEN
-               DO 10, I = 1, LENY
-                  Y( I ) = ZERO
-   10          CONTINUE
-            ELSE
-               DO 20, I = 1, LENY
-                  Y( I ) = BETA*Y( I )
-   20          CONTINUE
-            END IF
-         ELSE
-            IY = KY
-            IF( BETA.EQ.ZERO )THEN
-               DO 30, I = 1, LENY
-                  Y( IY ) = ZERO
-                  IY      = IY   + INCY
-   30          CONTINUE
-            ELSE
-               DO 40, I = 1, LENY
-                  Y( IY ) = BETA*Y( IY )
-                  IY      = IY           + INCY
-   40          CONTINUE
-            END IF
-         END IF
-      END IF
-      IF( ALPHA.EQ.ZERO )
-     $   RETURN
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  y := alpha*A*x + y.
-*
-         JX = KX
-         IF( INCY.EQ.1 )THEN
-            DO 60, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  DO 50, I = 1, M
-                     Y( I ) = Y( I ) + TEMP*A( I, J )
-   50             CONTINUE
-               END IF
-               JX = JX + INCX
-   60       CONTINUE
-         ELSE
-            DO 80, J = 1, N
-               IF( X( JX ).NE.ZERO )THEN
-                  TEMP = ALPHA*X( JX )
-                  IY   = KY
-                  DO 70, I = 1, M
-                     Y( IY ) = Y( IY ) + TEMP*A( I, J )
-                     IY      = IY      + INCY
-   70             CONTINUE
-               END IF
-               JX = JX + INCX
-   80       CONTINUE
-         END IF
-      ELSE
-*
-*        Form  y := alpha*A'*x + y.
-*
-         JY = KY
-         IF( INCX.EQ.1 )THEN
-            DO 100, J = 1, N
-               TEMP = ZERO
-               DO 90, I = 1, M
-                  TEMP = TEMP + A( I, J )*X( I )
-   90          CONTINUE
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  100       CONTINUE
-         ELSE
-            DO 120, J = 1, N
-               TEMP = ZERO
-               IX   = KX
-               DO 110, I = 1, M
-                  TEMP = TEMP + A( I, J )*X( IX )
-                  IX   = IX   + INCX
-  110          CONTINUE
-               Y( JY ) = Y( JY ) + ALPHA*TEMP
-               JY      = JY      + INCY
-  120       CONTINUE
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DGEMV .
-*
-      END
-      subroutine  dscal(n,da,dx,incx)
-c
-c     scales a vector by a constant.
-c     uses unrolled loops for increment equal to one.
-c     jack dongarra, linpack, 3/11/78.
-c     modified to correct problem with negative increment, 8/21/90.
-c
-      double precision da,dx(1)
-      integer i,incx,ix,m,mp1,n
-c
-      if(n.le.0)return
-      if(incx.eq.1)go to 20
-c
-c        code for increment not equal to 1
-c
-      ix = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      do 10 i = 1,n
-        dx(ix) = da*dx(ix)
-        ix = ix + incx
-   10 continue
-      return
-c
-c        code for increment equal to 1
-c
-c
-c        clean-up loop
-c
-   20 m = mod(n,5)
-      if( m .eq. 0 ) go to 40
-      do 30 i = 1,m
-        dx(i) = da*dx(i)
-   30 continue
-      if( n .lt. 5 ) return
-   40 mp1 = m + 1
-      do 50 i = mp1,n,5
-        dx(i) = da*dx(i)
-        dx(i + 1) = da*dx(i + 1)
-        dx(i + 2) = da*dx(i + 2)
-        dx(i + 3) = da*dx(i + 3)
-        dx(i + 4) = da*dx(i + 4)
-   50 continue
-      return
-      end
-      SUBROUTINE DORM2R( SIDE, TRANS, M, N, K, A, LDA, TAU, C, LDC,
-     $                   WORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE, TRANS
-      INTEGER            INFO, K, LDA, LDC, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), C( LDC, * ), TAU( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DORM2R overwrites the general real m by n matrix C with
-*
-*        Q * C  if SIDE = 'L' and TRANS = 'N', or
-*
-*        Q'* C  if SIDE = 'L' and TRANS = 'T', or
-*
-*        C * Q  if SIDE = 'R' and TRANS = 'N', or
-*
-*        C * Q' if SIDE = 'R' and TRANS = 'T',
-*
-*  where Q is a real orthogonal matrix defined as the product of k
-*  elementary reflectors
-*
-*        Q = H(1) H(2) . . . H(k)
-*
-*  as returned by DGEQRF. Q is of order m if SIDE = 'L' and of order n
-*  if SIDE = 'R'.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': apply Q or Q' from the Left
-*          = 'R': apply Q or Q' from the Right
-*
-*  TRANS   (input) CHARACTER*1
-*          = 'N': apply Q  (No transpose)
-*          = 'T': apply Q' (Transpose)
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C. M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C. N >= 0.
-*
-*  K       (input) INTEGER
-*          The number of elementary reflectors whose product defines
-*          the matrix Q.
-*          If SIDE = 'L', M >= K >= 0;
-*          if SIDE = 'R', N >= K >= 0.
-*
-*  A       (input) DOUBLE PRECISION array, dimension (LDA,K)
-*          The i-th column must contain the vector which defines the
-*          elementary reflector H(i), for i = 1,2,...,k, as returned by
-*          DGEQRF in the first k columns of its array argument A.
-*          A is modified by the routine but restored on exit.
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.
-*          If SIDE = 'L', LDA >= max(1,M);
-*          if SIDE = 'R', LDA >= max(1,N).
-*
-*  TAU     (input) DOUBLE PRECISION array, dimension (K)
-*          TAU(i) must contain the scalar factor of the elementary
-*          reflector H(i), as returned by DGEQRF.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by Q*C or Q'*C or C*Q' or C*Q.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDC >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension
-*                                   (N) if SIDE = 'L',
-*                                   (M) if SIDE = 'R'
-*
-*  INFO    (output) INTEGER
-*          = 0: successful exit
-*          < 0: if INFO = -i, the i-th argument had an illegal value
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      LOGICAL            LEFT, NOTRAN
-      INTEGER            I, I1, I2, I3, IC, JC, MI, NI, NQ
-      DOUBLE PRECISION   AII
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLARF, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      LEFT = LSAME( SIDE, 'L' )
-      NOTRAN = LSAME( TRANS, 'N' )
-*
-*     NQ is the order of Q
-*
-      IF( LEFT ) THEN
-         NQ = M
-      ELSE
-         NQ = N
-      END IF
-      IF( .NOT.LEFT .AND. .NOT.LSAME( SIDE, 'R' ) ) THEN
-         INFO = -1
-      ELSE IF( .NOT.NOTRAN .AND. .NOT.LSAME( TRANS, 'T' ) ) THEN
-         INFO = -2
-      ELSE IF( M.LT.0 ) THEN
-         INFO = -3
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -4
-      ELSE IF( K.LT.0 .OR. K.GT.NQ ) THEN
-         INFO = -5
-      ELSE IF( LDA.LT.MAX( 1, NQ ) ) THEN
-         INFO = -7
-      ELSE IF( LDC.LT.MAX( 1, M ) ) THEN
-         INFO = -10
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DORM2R', -INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible
-*
-      IF( M.EQ.0 .OR. N.EQ.0 .OR. K.EQ.0 )
-     $   RETURN
-*
-      IF( ( LEFT .AND. .NOT.NOTRAN ) .OR. ( .NOT.LEFT .AND. NOTRAN ) )
-     $     THEN
-         I1 = 1
-         I2 = K
-         I3 = 1
-      ELSE
-         I1 = K
-         I2 = 1
-         I3 = -1
-      END IF
-*
-      IF( LEFT ) THEN
-         NI = N
-         JC = 1
-      ELSE
-         MI = M
-         IC = 1
-      END IF
-*
-      DO 10 I = I1, I2, I3
-         IF( LEFT ) THEN
-*
-*           H(i) is applied to C(i:m,1:n)
-*
-            MI = M - I + 1
-            IC = I
-         ELSE
-*
-*           H(i) is applied to C(1:m,i:n)
-*
-            NI = N - I + 1
-            JC = I
-         END IF
-*
-*        Apply H(i)
-*
-         AII = A( I, I )
-         A( I, I ) = ONE
-         CALL DLARF( SIDE, MI, NI, A( I, I ), 1, TAU( I ), C( IC, JC ),
-     $               LDC, WORK )
-         A( I, I ) = AII
-   10 CONTINUE
-      RETURN
-*
-*     End of DORM2R
-*
-      END
-      SUBROUTINE DLARFT( DIRECT, STOREV, N, K, V, LDV, TAU, T, LDT )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          DIRECT, STOREV
-      INTEGER            K, LDT, LDV, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   T( LDT, * ), TAU( * ), V( LDV, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFT forms the triangular factor T of a real block reflector H
-*  of order n, which is defined as a product of k elementary reflectors.
-*
-*  If DIRECT = 'F', H = H(1) H(2) . . . H(k) and T is upper triangular;
-*
-*  If DIRECT = 'B', H = H(k) . . . H(2) H(1) and T is lower triangular.
-*
-*  If STOREV = 'C', the vector which defines the elementary reflector
-*  H(i) is stored in the i-th column of the array V, and
-*
-*     H  =  I - V * T * V'
-*
-*  If STOREV = 'R', the vector which defines the elementary reflector
-*  H(i) is stored in the i-th row of the array V, and
-*
-*     H  =  I - V' * T * V
-*
-*  Arguments
-*  =========
-*
-*  DIRECT  (input) CHARACTER*1
-*          Specifies the order in which the elementary reflectors are
-*          multiplied to form the block reflector:
-*          = 'F': H = H(1) H(2) . . . H(k) (Forward)
-*          = 'B': H = H(k) . . . H(2) H(1) (Backward)
-*
-*  STOREV  (input) CHARACTER*1
-*          Specifies how the vectors which define the elementary
-*          reflectors are stored (see also Further Details):
-*          = 'C': columnwise
-*          = 'R': rowwise
-*
-*  N       (input) INTEGER
-*          The order of the block reflector H. N >= 0.
-*
-*  K       (input) INTEGER
-*          The order of the triangular factor T (= the number of
-*          elementary reflectors). K >= 1.
-*
-*  V       (input/output) DOUBLE PRECISION array, dimension
-*                               (LDV,K) if STOREV = 'C'
-*                               (LDV,N) if STOREV = 'R'
-*          The matrix V. See further details.
-*
-*  LDV     (input) INTEGER
-*          The leading dimension of the array V.
-*          If STOREV = 'C', LDV >= max(1,N); if STOREV = 'R', LDV >= K.
-*
-*  TAU     (input) DOUBLE PRECISION array, dimension (K)
-*          TAU(i) must contain the scalar factor of the elementary
-*          reflector H(i).
-*
-*  T       (output) DOUBLE PRECISION array, dimension (LDT,K)
-*          The k by k triangular factor T of the block reflector.
-*          If DIRECT = 'F', T is upper triangular; if DIRECT = 'B', T is
-*          lower triangular. The rest of the array is not used.
-*
-*  LDT     (input) INTEGER
-*          The leading dimension of the array T. LDT >= K.
-*
-*  Further Details
-*  ===============
-*
-*  The shape of the matrix V and the storage of the vectors which define
-*  the H(i) is best illustrated by the following example with n = 5 and
-*  k = 3. The elements equal to 1 are not stored; the corresponding
-*  array elements are modified but restored on exit. The rest of the
-*  array is not used.
-*
-*  DIRECT = 'F' and STOREV = 'C':         DIRECT = 'F' and STOREV = 'R':
-*
-*               V = (  1       )                 V = (  1 v1 v1 v1 v1 )
-*                   ( v1  1    )                     (     1 v2 v2 v2 )
-*                   ( v1 v2  1 )                     (        1 v3 v3 )
-*                   ( v1 v2 v3 )
-*                   ( v1 v2 v3 )
-*
-*  DIRECT = 'B' and STOREV = 'C':         DIRECT = 'B' and STOREV = 'R':
-*
-*               V = ( v1 v2 v3 )                 V = ( v1 v1  1       )
-*                   ( v1 v2 v3 )                     ( v2 v2 v2  1    )
-*                   (  1 v2 v3 )                     ( v3 v3 v3 v3  1 )
-*                   (     1 v3 )
-*                   (        1 )
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            I, J
-      DOUBLE PRECISION   VII
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEMV, DTRMV
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. Executable Statements ..
-*
-*     Quick return if possible
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      IF( LSAME( DIRECT, 'F' ) ) THEN
-         DO 20 I = 1, K
-            IF( TAU( I ).EQ.ZERO ) THEN
-*
-*              H(i)  =  I
-*
-               DO 10 J = 1, I
-                  T( J, I ) = ZERO
-   10          CONTINUE
-            ELSE
-*
-*              general case
-*
-               VII = V( I, I )
-               V( I, I ) = ONE
-               IF( LSAME( STOREV, 'C' ) ) THEN
-*
-*                 T(1:i-1,i) := - tau(i) * V(i:n,1:i-1)' * V(i:n,i)
-*
-                  CALL DGEMV( 'Transpose', N-I+1, I-1, -TAU( I ),
-     $                        V( I, 1 ), LDV, V( I, I ), 1, ZERO,
-     $                        T( 1, I ), 1 )
-               ELSE
-*
-*                 T(1:i-1,i) := - tau(i) * V(1:i-1,i:n) * V(i,i:n)'
-*
-                  CALL DGEMV( 'No transpose', I-1, N-I+1, -TAU( I ),
-     $                        V( 1, I ), LDV, V( I, I ), LDV, ZERO,
-     $                        T( 1, I ), 1 )
-               END IF
-               V( I, I ) = VII
-*
-*              T(1:i-1,i) := T(1:i-1,1:i-1) * T(1:i-1,i)
-*
-               CALL DTRMV( 'Upper', 'No transpose', 'Non-unit', I-1, T,
-     $                     LDT, T( 1, I ), 1 )
-               T( I, I ) = TAU( I )
-            END IF
-   20    CONTINUE
-      ELSE
-         DO 40 I = K, 1, -1
-            IF( TAU( I ).EQ.ZERO ) THEN
-*
-*              H(i)  =  I
-*
-               DO 30 J = I, K
-                  T( J, I ) = ZERO
-   30          CONTINUE
-            ELSE
-*
-*              general case
-*
-               IF( I.LT.K ) THEN
-                  IF( LSAME( STOREV, 'C' ) ) THEN
-                     VII = V( N-K+I, I )
-                     V( N-K+I, I ) = ONE
-*
-*                    T(i+1:k,i) :=
-*                            - tau(i) * V(1:n-k+i,i+1:k)' * V(1:n-k+i,i)
-*
-                     CALL DGEMV( 'Transpose', N-K+I, K-I, -TAU( I ),
-     $                           V( 1, I+1 ), LDV, V( 1, I ), 1, ZERO,
-     $                           T( I+1, I ), 1 )
-                     V( N-K+I, I ) = VII
-                  ELSE
-                     VII = V( I, N-K+I )
-                     V( I, N-K+I ) = ONE
-*
-*                    T(i+1:k,i) :=
-*                            - tau(i) * V(i+1:k,1:n-k+i) * V(i,1:n-k+i)'
-*
-                     CALL DGEMV( 'No transpose', K-I, N-K+I, -TAU( I ),
-     $                           V( I+1, 1 ), LDV, V( I, 1 ), LDV, ZERO,
-     $                           T( I+1, I ), 1 )
-                     V( I, N-K+I ) = VII
-                  END IF
-*
-*                 T(i+1:k,i) := T(i+1:k,i+1:k) * T(i+1:k,i)
-*
-                  CALL DTRMV( 'Lower', 'No transpose', 'Non-unit', K-I,
-     $                        T( I+1, I+1 ), LDT, T( I+1, I ), 1 )
-               END IF
-               T( I, I ) = TAU( I )
-            END IF
-   40    CONTINUE
-      END IF
-      RETURN
-*
-*     End of DLARFT
-*
-      END
-      SUBROUTINE DLARFB( SIDE, TRANS, DIRECT, STOREV, M, N, K, V, LDV,
-     $                   T, LDT, C, LDC, WORK, LDWORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          DIRECT, SIDE, STOREV, TRANS
-      INTEGER            K, LDC, LDT, LDV, LDWORK, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   C( LDC, * ), T( LDT, * ), V( LDV, * ),
-     $                   WORK( LDWORK, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARFB applies a real block reflector H or its transpose H' to a
-*  real m by n matrix C, from either the left or the right.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': apply H or H' from the Left
-*          = 'R': apply H or H' from the Right
-*
-*  TRANS   (input) CHARACTER*1
-*          = 'N': apply H (No transpose)
-*          = 'T': apply H' (Transpose)
-*
-*  DIRECT  (input) CHARACTER*1
-*          Indicates how H is formed from a product of elementary
-*          reflectors
-*          = 'F': H = H(1) H(2) . . . H(k) (Forward)
-*          = 'B': H = H(k) . . . H(2) H(1) (Backward)
-*
-*  STOREV  (input) CHARACTER*1
-*          Indicates how the vectors which define the elementary
-*          reflectors are stored:
-*          = 'C': Columnwise
-*          = 'R': Rowwise
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  K       (input) INTEGER
-*          The order of the matrix T (= the number of elementary
-*          reflectors whose product defines the block reflector).
-*
-*  V       (input) DOUBLE PRECISION array, dimension
-*                                (LDV,K) if STOREV = 'C'
-*                                (LDV,M) if STOREV = 'R' and SIDE = 'L'
-*                                (LDV,N) if STOREV = 'R' and SIDE = 'R'
-*          The matrix V. See further details.
-*
-*  LDV     (input) INTEGER
-*          The leading dimension of the array V.
-*          If STOREV = 'C' and SIDE = 'L', LDV >= max(1,M);
-*          if STOREV = 'C' and SIDE = 'R', LDV >= max(1,N);
-*          if STOREV = 'R', LDV >= K.
-*
-*  T       (input) DOUBLE PRECISION array, dimension (LDT,K)
-*          The triangular k by k matrix T in the representation of the
-*          block reflector.
-*
-*  LDT     (input) INTEGER
-*          The leading dimension of the array T. LDT >= K.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by H*C or H'*C or C*H or C*H'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDA >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (LDWORK,K)
-*
-*  LDWORK  (input) INTEGER
-*          The leading dimension of the array WORK.
-*          If SIDE = 'L', LDWORK >= max(1,N);
-*          if SIDE = 'R', LDWORK >= max(1,M).
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      CHARACTER          TRANST
-      INTEGER            I, J
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DCOPY, DGEMM, DTRMM
-*     ..
-*     .. Executable Statements ..
-*
-*     Quick return if possible
-*
-      IF( M.LE.0 .OR. N.LE.0 )
-     $   RETURN
-*
-      IF( LSAME( TRANS, 'N' ) ) THEN
-         TRANST = 'T'
-      ELSE
-         TRANST = 'N'
-      END IF
-*
-      IF( LSAME( STOREV, 'C' ) ) THEN
-*
-         IF( LSAME( DIRECT, 'F' ) ) THEN
-*
-*           Let  V =  ( V1 )    (first K rows)
-*                     ( V2 )
-*           where  V1  is unit lower triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V  =  (C1'*V1 + C2'*V2)  (stored in WORK)
-*
-*              W := C1'
-*
-               DO 10 J = 1, K
-                  CALL DCOPY( N, C( J, 1 ), LDC, WORK( 1, J ), 1 )
-   10          CONTINUE
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', N,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C2'*V2
-*
-                  CALL DGEMM( 'Transpose', 'No transpose', N, K, M-K,
-     $                        ONE, C( K+1, 1 ), LDC, V( K+1, 1 ), LDV,
-     $                        ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Upper', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C2 := C2 - V2 * W'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M-K, N, K,
-     $                        -ONE, V( K+1, 1 ), LDV, WORK, LDWORK, ONE,
-     $                        C( K+1, 1 ), LDC )
-               END IF
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', N, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W'
-*
-               DO 30 J = 1, K
-                  DO 20 I = 1, N
-                     C( J, I ) = C( J, I ) - WORK( I, J )
-   20             CONTINUE
-   30          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V  =  (C1*V1 + C2*V2)  (stored in WORK)
-*
-*              W := C1
-*
-               DO 40 J = 1, K
-                  CALL DCOPY( M, C( 1, J ), 1, WORK( 1, J ), 1 )
-   40          CONTINUE
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', M,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C2 * V2
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, K, N-K,
-     $                        ONE, C( 1, K+1 ), LDC, V( K+1, 1 ), LDV,
-     $                        ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Upper', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V'
-*
-               IF( N.GT.K ) THEN
-*
-*                 C2 := C2 - W * V2'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V( K+1, 1 ), LDV, ONE,
-     $                        C( 1, K+1 ), LDC )
-               END IF
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', M, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W
-*
-               DO 60 J = 1, K
-                  DO 50 I = 1, M
-                     C( I, J ) = C( I, J ) - WORK( I, J )
-   50             CONTINUE
-   60          CONTINUE
-            END IF
-*
-         ELSE
-*
-*           Let  V =  ( V1 )
-*                     ( V2 )    (last K rows)
-*           where  V2  is unit upper triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V  =  (C1'*V1 + C2'*V2)  (stored in WORK)
-*
-*              W := C2'
-*
-               DO 70 J = 1, K
-                  CALL DCOPY( N, C( M-K+J, 1 ), LDC, WORK( 1, J ), 1 )
-   70          CONTINUE
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', N,
-     $                     K, ONE, V( M-K+1, 1 ), LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C1'*V1
-*
-                  CALL DGEMM( 'Transpose', 'No transpose', N, K, M-K,
-     $                        ONE, C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Lower', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C1 := C1 - V1 * W'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M-K, N, K,
-     $                        -ONE, V, LDV, WORK, LDWORK, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', N, K,
-     $                     ONE, V( M-K+1, 1 ), LDV, WORK, LDWORK )
-*
-*              C2 := C2 - W'
-*
-               DO 90 J = 1, K
-                  DO 80 I = 1, N
-                     C( M-K+J, I ) = C( M-K+J, I ) - WORK( I, J )
-   80             CONTINUE
-   90          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V  =  (C1*V1 + C2*V2)  (stored in WORK)
-*
-*              W := C2
-*
-               DO 100 J = 1, K
-                  CALL DCOPY( M, C( 1, N-K+J ), 1, WORK( 1, J ), 1 )
-  100          CONTINUE
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', M,
-     $                     K, ONE, V( N-K+1, 1 ), LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C1 * V1
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, K, N-K,
-     $                        ONE, C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Lower', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V'
-*
-               IF( N.GT.K ) THEN
-*
-*                 C1 := C1 - W * V1'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V, LDV, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', M, K,
-     $                     ONE, V( N-K+1, 1 ), LDV, WORK, LDWORK )
-*
-*              C2 := C2 - W
-*
-               DO 120 J = 1, K
-                  DO 110 I = 1, M
-                     C( I, N-K+J ) = C( I, N-K+J ) - WORK( I, J )
-  110             CONTINUE
-  120          CONTINUE
-            END IF
-         END IF
-*
-      ELSE IF( LSAME( STOREV, 'R' ) ) THEN
-*
-         IF( LSAME( DIRECT, 'F' ) ) THEN
-*
-*           Let  V =  ( V1  V2 )    (V1: first K columns)
-*           where  V1  is unit upper triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V'  =  (C1'*V1' + C2'*V2') (stored in WORK)
-*
-*              W := C1'
-*
-               DO 130 J = 1, K
-                  CALL DCOPY( N, C( J, 1 ), LDC, WORK( 1, J ), 1 )
-  130          CONTINUE
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', N, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C2'*V2'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', N, K, M-K, ONE,
-     $                        C( K+1, 1 ), LDC, V( 1, K+1 ), LDV, ONE,
-     $                        WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Upper', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V' * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C2 := C2 - V2' * W'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', M-K, N, K, -ONE,
-     $                        V( 1, K+1 ), LDV, WORK, LDWORK, ONE,
-     $                        C( K+1, 1 ), LDC )
-               END IF
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', N,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W'
-*
-               DO 150 J = 1, K
-                  DO 140 I = 1, N
-                     C( J, I ) = C( J, I ) - WORK( I, J )
-  140             CONTINUE
-  150          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V'  =  (C1*V1' + C2*V2')  (stored in WORK)
-*
-*              W := C1
-*
-               DO 160 J = 1, K
-                  CALL DCOPY( M, C( 1, J ), 1, WORK( 1, J ), 1 )
-  160          CONTINUE
-*
-*              W := W * V1'
-*
-               CALL DTRMM( 'Right', 'Upper', 'Transpose', 'Unit', M, K,
-     $                     ONE, V, LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C2 * V2'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, K, N-K,
-     $                        ONE, C( 1, K+1 ), LDC, V( 1, K+1 ), LDV,
-     $                        ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Upper', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V
-*
-               IF( N.GT.K ) THEN
-*
-*                 C2 := C2 - W * V2
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V( 1, K+1 ), LDV, ONE,
-     $                        C( 1, K+1 ), LDC )
-               END IF
-*
-*              W := W * V1
-*
-               CALL DTRMM( 'Right', 'Upper', 'No transpose', 'Unit', M,
-     $                     K, ONE, V, LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W
-*
-               DO 180 J = 1, K
-                  DO 170 I = 1, M
-                     C( I, J ) = C( I, J ) - WORK( I, J )
-  170             CONTINUE
-  180          CONTINUE
-*
-            END IF
-*
-         ELSE
-*
-*           Let  V =  ( V1  V2 )    (V2: last K columns)
-*           where  V2  is unit lower triangular.
-*
-            IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*              Form  H * C  or  H' * C  where  C = ( C1 )
-*                                                  ( C2 )
-*
-*              W := C' * V'  =  (C1'*V1' + C2'*V2') (stored in WORK)
-*
-*              W := C2'
-*
-               DO 190 J = 1, K
-                  CALL DCOPY( N, C( M-K+J, 1 ), LDC, WORK( 1, J ), 1 )
-  190          CONTINUE
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', N, K,
-     $                     ONE, V( 1, M-K+1 ), LDV, WORK, LDWORK )
-               IF( M.GT.K ) THEN
-*
-*                 W := W + C1'*V1'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', N, K, M-K, ONE,
-     $                        C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T'  or  W * T
-*
-               CALL DTRMM( 'Right', 'Lower', TRANST, 'Non-unit', N, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - V' * W'
-*
-               IF( M.GT.K ) THEN
-*
-*                 C1 := C1 - V1' * W'
-*
-                  CALL DGEMM( 'Transpose', 'Transpose', M-K, N, K, -ONE,
-     $                        V, LDV, WORK, LDWORK, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', N,
-     $                     K, ONE, V( 1, M-K+1 ), LDV, WORK, LDWORK )
-*
-*              C2 := C2 - W'
-*
-               DO 210 J = 1, K
-                  DO 200 I = 1, N
-                     C( M-K+J, I ) = C( M-K+J, I ) - WORK( I, J )
-  200             CONTINUE
-  210          CONTINUE
-*
-            ELSE IF( LSAME( SIDE, 'R' ) ) THEN
-*
-*              Form  C * H  or  C * H'  where  C = ( C1  C2 )
-*
-*              W := C * V'  =  (C1*V1' + C2*V2')  (stored in WORK)
-*
-*              W := C2
-*
-               DO 220 J = 1, K
-                  CALL DCOPY( M, C( 1, N-K+J ), 1, WORK( 1, J ), 1 )
-  220          CONTINUE
-*
-*              W := W * V2'
-*
-               CALL DTRMM( 'Right', 'Lower', 'Transpose', 'Unit', M, K,
-     $                     ONE, V( 1, N-K+1 ), LDV, WORK, LDWORK )
-               IF( N.GT.K ) THEN
-*
-*                 W := W + C1 * V1'
-*
-                  CALL DGEMM( 'No transpose', 'Transpose', M, K, N-K,
-     $                        ONE, C, LDC, V, LDV, ONE, WORK, LDWORK )
-               END IF
-*
-*              W := W * T  or  W * T'
-*
-               CALL DTRMM( 'Right', 'Lower', TRANS, 'Non-unit', M, K,
-     $                     ONE, T, LDT, WORK, LDWORK )
-*
-*              C := C - W * V
-*
-               IF( N.GT.K ) THEN
-*
-*                 C1 := C1 - W * V1
-*
-                  CALL DGEMM( 'No transpose', 'No transpose', M, N-K, K,
-     $                        -ONE, WORK, LDWORK, V, LDV, ONE, C, LDC )
-               END IF
-*
-*              W := W * V2
-*
-               CALL DTRMM( 'Right', 'Lower', 'No transpose', 'Unit', M,
-     $                     K, ONE, V( 1, N-K+1 ), LDV, WORK, LDWORK )
-*
-*              C1 := C1 - W
-*
-               DO 240 J = 1, K
-                  DO 230 I = 1, M
-                     C( I, N-K+J ) = C( I, N-K+J ) - WORK( I, J )
-  230             CONTINUE
-  240          CONTINUE
-*
-            END IF
-*
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DLARFB
-*
-      END
-      INTEGER          FUNCTION ILAENV( ISPEC, NAME, OPTS, N1, N2, N3,
-     $                 N4 )
-*
-*  -- LAPACK auxiliary routine (preliminary version) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 20, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER*( * )    NAME, OPTS
-      INTEGER            ISPEC, N1, N2, N3, N4
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ILAENV is called from the LAPACK routines to choose problem-dependent
-*  parameters for the local environment.  See ISPEC for a description of
-*  the parameters.
-*
-*  This version provides a set of parameters which should give good,
-*  but not optimal, performance on many of the currently available
-*  computers.  Users are encouraged to modify this subroutine to set
-*  the tuning parameters for their particular machine using the option
-*  and problem size information in the arguments.
-*
-*  This routine will not function correctly if it is converted to all
-*  lower case.  Converting it to all upper case is allowed.
-*
-*  Arguments
-*  =========
-*
-*  ISPEC   (input) INTEGER
-*          Specifies the parameter to be returned as the value of
-*          ILAENV.
-*          = 1: the optimal blocksize; if this value is 1, an unblocked
-*               algorithm will give the best performance.
-*          = 2: the minimum block size for which the block routine
-*               should be used; if the usable block size is less than
-*               this value, an unblocked routine should be used.
-*          = 3: the crossover point (in a block routine, for N less
-*               than this value, an unblocked routine should be used)
-*          = 4: the number of shifts, used in the nonsymmetric
-*               eigenvalue routines
-*          = 5: the minimum column dimension for blocking to be used;
-*               rectangular blocks must have dimension at least k by m,
-*               where k is given by ILAENV(2,...) and m by ILAENV(5,...)
-*          = 6: the crossover point for the SVD (when reducing an m by n
-*               matrix to bidiagonal form, if max(m,n)/min(m,n) exceeds
-*               this value, a QR factorization is used first to reduce
-*               the matrix to a triangular form.)
-*          = 7: the number of processors
-*          = 8: the crossover point for the multishift QR and QZ methods
-*               for nonsymmetric eigenvalue problems.
-*
-*  NAME    (input) CHARACTER*(*)
-*          The name of the calling subroutine, in either upper case or
-*          lower case.
-*
-*  OPTS    (input) CHARACTER*(*)
-*          The character options to the subroutine NAME, concatenated
-*          into a single character string.  For example, UPLO = 'U',
-*          TRANS = 'T', and DIAG = 'N' for a triangular routine would
-*          be specified as OPTS = 'UTN'.
-*
-*  N1      (input) INTEGER
-*  N2      (input) INTEGER
-*  N3      (input) INTEGER
-*  N4      (input) INTEGER
-*          Problem dimensions for the subroutine NAME; these may not all
-*          be required.
-*
-* (ILAENV) (output) INTEGER
-*          >= 0: the value of the parameter specified by ISPEC
-*          < 0:  if ILAENV = -k, the k-th argument had an illegal value.
-*
-*  Further Details
-*  ===============
-*
-*  The following conventions have been used when calling ILAENV from the
-*  LAPACK routines:
-*  1)  OPTS is a concatenation of all of the character options to
-*      subroutine NAME, in the same order that they appear in the
-*      argument list for NAME, even if they are not used in determining
-*      the value of the parameter specified by ISPEC.
-*  2)  The problem dimensions N1, N2, N3, N4 are specified in the order
-*      that they appear in the argument list for NAME.  N1 is used
-*      first, N2 second, and so on, and unused problem dimensions are
-*      passed a value of -1.
-*  3)  The parameter value returned by ILAENV is checked for validity in
-*      the calling subroutine.  For example, ILAENV is used to retrieve
-*      the optimal blocksize for STRTRI as follows:
-*
-*      NB = ILAENV( 1, 'STRTRI', UPLO // DIAG, N, -1, -1, -1 )
-*      IF( NB.LE.1 ) NB = MAX( 1, N )
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      LOGICAL            CNAME, SNAME
-      CHARACTER*1        C1
-      CHARACTER*2        C2, C4
-      CHARACTER*3        C3
-      CHARACTER*6        SUBNAM
-      INTEGER            I, IC, IZ, NB, NBMIN, NX
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          CHAR, ICHAR, INT, MIN, REAL
-*     ..
-*     .. Executable Statements ..
-*
-      GO TO ( 100, 100, 100, 400, 500, 600, 700, 800 ) ISPEC
-*
-*     Invalid value for ISPEC
-*
-      ILAENV = -1
-      RETURN
-*
-  100 CONTINUE
-*
-*     Convert NAME to upper case if the first character is lower case.
-*
-      ILAENV = 1
-      SUBNAM = NAME
-      IC = ICHAR( SUBNAM( 1:1 ) )
-      IZ = ICHAR( 'Z' )
-      IF( IZ.EQ.90 .OR. IZ.EQ.122 ) THEN
-*
-*        ASCII character set
-*
-         IF( IC.GE.97 .AND. IC.LE.122 ) THEN
-            SUBNAM( 1:1 ) = CHAR( IC-32 )
-            DO 10 I = 2, 6
-               IC = ICHAR( SUBNAM( I:I ) )
-               IF( IC.GE.97 .AND. IC.LE.122 )
-     $            SUBNAM( I:I ) = CHAR( IC-32 )
-   10       CONTINUE
-         END IF
-*
-      ELSE IF( IZ.EQ.233 .OR. IZ.EQ.169 ) THEN
-*
-*        EBCDIC character set
-*
-         IF( ( IC.GE.129 .AND. IC.LE.137 ) .OR.
-     $       ( IC.GE.145 .AND. IC.LE.153 ) .OR.
-     $       ( IC.GE.162 .AND. IC.LE.169 ) ) THEN
-            SUBNAM( 1:1 ) = CHAR( IC+64 )
-            DO 20 I = 2, 6
-               IC = ICHAR( SUBNAM( I:I ) )
-               IF( ( IC.GE.129 .AND. IC.LE.137 ) .OR.
-     $             ( IC.GE.145 .AND. IC.LE.153 ) .OR.
-     $             ( IC.GE.162 .AND. IC.LE.169 ) )
-     $            SUBNAM( I:I ) = CHAR( IC+64 )
-   20       CONTINUE
-         END IF
-*
-      ELSE IF( IZ.EQ.218 .OR. IZ.EQ.250 ) THEN
-*
-*        Prime machines:  ASCII+128
-*
-         IF( IC.GE.225 .AND. IC.LE.250 ) THEN
-            SUBNAM( 1:1 ) = CHAR( IC-32 )
-            DO 30 I = 2, 6
-               IC = ICHAR( SUBNAM( I:I ) )
-               IF( IC.GE.225 .AND. IC.LE.250 )
-     $            SUBNAM( I:I ) = CHAR( IC-32 )
-   30       CONTINUE
-         END IF
-      END IF
-*
-      C1 = SUBNAM( 1:1 )
-      SNAME = C1.EQ.'S' .OR. C1.EQ.'D'
-      CNAME = C1.EQ.'C' .OR. C1.EQ.'Z'
-      IF( .NOT.( CNAME .OR. SNAME ) )
-     $   RETURN
-      C2 = SUBNAM( 2:3 )
-      C3 = SUBNAM( 4:6 )
-      C4 = C3( 2:3 )
-*
-      GO TO ( 110, 200, 300 ) ISPEC
-*
-  110 CONTINUE
-*
-*     ISPEC = 1:  block size
-*
-*     In these examples, separate code is provided for setting NB for
-*     real and complex.  We assume that NB will take the same value in
-*     single or double precision.
-*
-      NB = 1
-*
-      IF( C2.EQ.'GE' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         ELSE IF( C3.EQ.'QRF' .OR. C3.EQ.'RQF' .OR. C3.EQ.'LQF' .OR.
-     $            C3.EQ.'QLF' ) THEN
-            IF( SNAME ) THEN
-               NB = 32
-            ELSE
-               NB = 32
-            END IF
-         ELSE IF( C3.EQ.'HRD' ) THEN
-            IF( SNAME ) THEN
-               NB = 32
-            ELSE
-               NB = 32
-            END IF
-         ELSE IF( C3.EQ.'BRD' ) THEN
-            IF( SNAME ) THEN
-               NB = 32
-            ELSE
-               NB = 32
-            END IF
-         ELSE IF( C3.EQ.'TRI' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'PO' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'SY' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         ELSE IF( SNAME .AND. C3.EQ.'TRD' ) THEN
-            NB = 1
-         ELSE IF( SNAME .AND. C3.EQ.'GST' ) THEN
-            NB = 64
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'HE' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            NB = 64
-         ELSE IF( C3.EQ.'TRD' ) THEN
-            NB = 1
-         ELSE IF( C3.EQ.'GST' ) THEN
-            NB = 64
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'OR' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'UN' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NB = 32
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'GB' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               IF( N4.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            ELSE
-               IF( N4.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'PB' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               IF( N2.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            ELSE
-               IF( N2.LE.64 ) THEN
-                  NB = 1
-               ELSE
-                  NB = 32
-               END IF
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'TR' ) THEN
-         IF( C3.EQ.'TRI' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'LA' ) THEN
-         IF( C3.EQ.'UUM' ) THEN
-            IF( SNAME ) THEN
-               NB = 64
-            ELSE
-               NB = 64
-            END IF
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'ST' ) THEN
-         IF( C3.EQ.'EBZ' ) THEN
-            NB = 1
-         END IF
-      END IF
-      ILAENV = NB
-      RETURN
-*
-  200 CONTINUE
-*
-*     ISPEC = 2:  minimum block size
-*
-      NBMIN = 2
-      IF( C2.EQ.'GE' ) THEN
-         IF( C3.EQ.'QRF' .OR. C3.EQ.'RQF' .OR. C3.EQ.'LQF' .OR.
-     $       C3.EQ.'QLF' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( C3.EQ.'HRD' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( C3.EQ.'BRD' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( C3.EQ.'TRI' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'SY' ) THEN
-         IF( C3.EQ.'TRF' ) THEN
-            IF( SNAME ) THEN
-               NBMIN = 2
-            ELSE
-               NBMIN = 2
-            END IF
-         ELSE IF( SNAME .AND. C3.EQ.'TRD' ) THEN
-            NBMIN = 2
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'HE' ) THEN
-         IF( C3.EQ.'TRD' ) THEN
-            NBMIN = 2
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'OR' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'UN' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         ELSE IF( C3( 1:1 ).EQ.'M' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NBMIN = 2
-            END IF
-         END IF
-      END IF
-      ILAENV = NBMIN
-      RETURN
-*
-  300 CONTINUE
-*
-*     ISPEC = 3:  crossover point
-*
-      NX = 0
-      IF( C2.EQ.'GE' ) THEN
-         IF( C3.EQ.'QRF' .OR. C3.EQ.'RQF' .OR. C3.EQ.'LQF' .OR.
-     $       C3.EQ.'QLF' ) THEN
-            IF( SNAME ) THEN
-               NX = 128
-            ELSE
-               NX = 128
-            END IF
-         ELSE IF( C3.EQ.'HRD' ) THEN
-            IF( SNAME ) THEN
-               NX = 128
-            ELSE
-               NX = 128
-            END IF
-         ELSE IF( C3.EQ.'BRD' ) THEN
-            IF( SNAME ) THEN
-               NX = 128
-            ELSE
-               NX = 128
-            END IF
-         END IF
-      ELSE IF( C2.EQ.'SY' ) THEN
-         IF( SNAME .AND. C3.EQ.'TRD' ) THEN
-            NX = 1
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'HE' ) THEN
-         IF( C3.EQ.'TRD' ) THEN
-            NX = 1
-         END IF
-      ELSE IF( SNAME .AND. C2.EQ.'OR' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NX = 128
-            END IF
-         END IF
-      ELSE IF( CNAME .AND. C2.EQ.'UN' ) THEN
-         IF( C3( 1:1 ).EQ.'G' ) THEN
-            IF( C4.EQ.'QR' .OR. C4.EQ.'RQ' .OR. C4.EQ.'LQ' .OR.
-     $          C4.EQ.'QL' .OR. C4.EQ.'HR' .OR. C4.EQ.'TR' .OR.
-     $          C4.EQ.'BR' ) THEN
-               NX = 128
-            END IF
-         END IF
-      END IF
-      ILAENV = NX
-      RETURN
-*
-  400 CONTINUE
-*
-*     ISPEC = 4:  number of shifts (used by xHSEQR)
-*
-      ILAENV = 6
-      RETURN
-*
-  500 CONTINUE
-*
-*     ISPEC = 5:  minimum column dimension (not used)
-*
-      ILAENV = 2
-      RETURN
-*
-  600 CONTINUE 
-*
-*     ISPEC = 6:  crossover point for SVD (used by xGELSS and xGESVD)
-*
-      ILAENV = INT( REAL( MIN( N1, N2 ) )*1.6E0 )
-      RETURN
-*
-  700 CONTINUE
-*
-*     ISPEC = 7:  number of processors (not used)
-*
-      ILAENV = 1
-      RETURN
-*
-  800 CONTINUE
-*
-*     ISPEC = 8:  crossover point for multishift (used by xHSEQR)
-*
-      ILAENV = 50
-      RETURN
-*
-*     End of ILAENV
-*
-      END
-      SUBROUTINE DGEQR2( M, N, A, LDA, TAU, WORK, INFO )
-*
-*  -- LAPACK routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            INFO, LDA, M, N
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), TAU( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEQR2 computes a QR factorization of a real m by n matrix A:
-*  A = Q * R.
-*
-*  Arguments
-*  =========
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix A.  M >= 0.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix A.  N >= 0.
-*
-*  A       (input/output) DOUBLE PRECISION array, dimension (LDA,N)
-*          On entry, the m by n matrix A.
-*          On exit, the elements on and above the diagonal of the array
-*          contain the min(m,n) by n upper trapezoidal matrix R (R is
-*          upper triangular if m >= n); the elements below the diagonal,
-*          with the array TAU, represent the orthogonal matrix Q as a
-*          product of elementary reflectors (see Further Details).
-*
-*  LDA     (input) INTEGER
-*          The leading dimension of the array A.  LDA >= max(1,M).
-*
-*  TAU     (output) DOUBLE PRECISION array, dimension (min(M,N))
-*          The scalar factors of the elementary reflectors (see Further
-*          Details).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension (N)
-*
-*  INFO    (output) INTEGER
-*          = 0: successful exit
-*          < 0: if INFO = -i, the i-th argument had an illegal value
-*
-*  Further Details
-*  ===============
-*
-*  The matrix Q is represented as a product of elementary reflectors
-*
-*     Q = H(1) H(2) . . . H(k), where k = min(m,n).
-*
-*  Each H(i) has the form
-*
-*     H(i) = I - tau * v * v'
-*
-*  where tau is a real scalar, and v is a real vector with
-*  v(1:i-1) = 0 and v(i) = 1; v(i+1:m) is stored on exit in A(i+1:m,i),
-*  and tau in TAU(i).
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            I, K
-      DOUBLE PRECISION   AII
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLARF, DLARFG, XERBLA
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX, MIN
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input arguments
-*
-      INFO = 0
-      IF( M.LT.0 ) THEN
-         INFO = -1
-      ELSE IF( N.LT.0 ) THEN
-         INFO = -2
-      ELSE IF( LDA.LT.MAX( 1, M ) ) THEN
-         INFO = -4
-      END IF
-      IF( INFO.NE.0 ) THEN
-         CALL XERBLA( 'DGEQR2', -INFO )
-         RETURN
-      END IF
-*
-      K = MIN( M, N )
-*
-      DO 10 I = 1, K
-*
-*        Generate elementary reflector H(i) to annihilate A(i+1:m,i)
-*
-         CALL DLARFG( M-I+1, A( I, I ), A( MIN( I+1, M ), I ), 1,
-     $                TAU( I ) )
-         IF( I.LT.N ) THEN
-*
-*           Apply H(i) to A(i:m,i+1:n) from the left
-*
-            AII = A( I, I )
-            A( I, I ) = ONE
-            CALL DLARF( 'Left', M-I+1, N-I, A( I, I ), 1, TAU( I ),
-     $                  A( I, I+1 ), LDA, WORK )
-            A( I, I ) = AII
-         END IF
-   10 CONTINUE
-      RETURN
-*
-*     End of DGEQR2
-*
-      END
-      DOUBLE COMPLEX   FUNCTION ZLADIV( X, Y )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      COMPLEX*16         X, Y
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZLADIV := X / Y, where X and Y are complex.  The computation of X / Y
-*  will not overflow on an intermediary step unless the results
-*  overflows.
-*
-*  Arguments
-*  =========
-*
-*  X       (input) COMPLEX*16
-*  Y       (input) COMPLEX*16
-*          The complex scalars X and Y.
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      DOUBLE PRECISION   ZI, ZR
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLADIV
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          DBLE, DCMPLX, DIMAG
-*     ..
-*     .. Executable Statements ..
-*
-      CALL DLADIV( DBLE( X ), DIMAG( X ), DBLE( Y ), DIMAG( Y ), ZR,
-     $             ZI )
-      ZLADIV = DCMPLX( ZR, ZI )
-*
-      RETURN
-*
-*     End of ZLADIV
-*
-      END
-      DOUBLE PRECISION FUNCTION DLAPY3( X, Y, Z )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   X, Y, Z
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAPY3 returns sqrt(x**2+y**2+z**2), taking care not to cause
-*  unnecessary overflow.
-*
-*  Arguments
-*  =========
-*
-*  X       (input) DOUBLE PRECISION
-*  Y       (input) DOUBLE PRECISION
-*  Z       (input) DOUBLE PRECISION
-*          X, Y and Z specify the values x, y and z.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER          ( ZERO = 0.0D0 )
-*     ..
-*     .. Local Scalars ..
-      DOUBLE PRECISION   W, XABS, YABS, ZABS
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, SQRT
-*     ..
-*     .. Executable Statements ..
-*
-      XABS = ABS( X )
-      YABS = ABS( Y )
-      ZABS = ABS( Z )
-      W = MAX( XABS, YABS, ZABS )
-      IF( W.EQ.ZERO ) THEN
-         DLAPY3 = ZERO
-      ELSE
-         DLAPY3 = W*SQRT( ( XABS / W )**2+( YABS / W )**2+
-     $            ( ZABS / W )**2 )
-      END IF
-      RETURN
-*
-*     End of DLAPY3
-*
-      END
-      DOUBLE PRECISION FUNCTION DLAMCH( CMACH )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          CMACH
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMCH determines double precision machine parameters.
-*
-*  Arguments
-*  =========
-*
-*  CMACH   (input) CHARACTER*1
-*          Specifies the value to be returned by DLAMCH:
-*          = 'E' or 'e',   DLAMCH := eps
-*          = 'S' or 's ,   DLAMCH := sfmin
-*          = 'B' or 'b',   DLAMCH := base
-*          = 'P' or 'p',   DLAMCH := eps*base
-*          = 'N' or 'n',   DLAMCH := t
-*          = 'R' or 'r',   DLAMCH := rnd
-*          = 'M' or 'm',   DLAMCH := emin
-*          = 'U' or 'u',   DLAMCH := rmin
-*          = 'L' or 'l',   DLAMCH := emax
-*          = 'O' or 'o',   DLAMCH := rmax
-*
-*          where
-*
-*          eps   = relative machine precision
-*          sfmin = safe minimum, such that 1/sfmin does not overflow
-*          base  = base of the machine
-*          prec  = eps*base
-*          t     = number of (base) digits in the mantissa
-*          rnd   = 1.0 when rounding occurs in addition, 0.0 otherwise
-*          emin  = minimum exponent before (gradual) underflow
-*          rmin  = underflow threshold - base**(emin-1)
-*          emax  = largest exponent before overflow
-*          rmax  = overflow threshold  - (base**emax)*(1-eps)
-*
-* =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Local Scalars ..
-      LOGICAL            FIRST, LRND
-      INTEGER            BETA, IMAX, IMIN, IT
-      DOUBLE PRECISION   BASE, EMAX, EMIN, EPS, PREC, RMACH, RMAX, RMIN,
-     $                   RND, SFMIN, SMALL, T
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLAMC2
-*     ..
-*     .. Save statement ..
-      SAVE               FIRST, EPS, SFMIN, BASE, T, RND, EMIN, RMIN,
-     $                   EMAX, RMAX, PREC
-*     ..
-*     .. Data statements ..
-      DATA               FIRST / .TRUE. /
-*     ..
-*     .. Executable Statements ..
-*
-      IF( FIRST ) THEN
-         FIRST = .FALSE.
-         CALL DLAMC2( BETA, IT, LRND, EPS, IMIN, RMIN, IMAX, RMAX )
-         BASE = BETA
-         T = IT
-         IF( LRND ) THEN
-            RND = ONE
-            EPS = ( BASE**( 1-IT ) ) / 2
-         ELSE
-            RND = ZERO
-            EPS = BASE**( 1-IT )
-         END IF
-         PREC = EPS*BASE
-         EMIN = IMIN
-         EMAX = IMAX
-         SFMIN = RMIN
-         SMALL = ONE / RMAX
-         IF( SMALL.GE.SFMIN ) THEN
-*
-*           Use SMALL plus a bit, to avoid the possibility of rounding
-*           causing overflow when computing  1/sfmin.
-*
-            SFMIN = SMALL*( ONE+EPS )
-         END IF
-      END IF
-*
-      IF( LSAME( CMACH, 'E' ) ) THEN
-         RMACH = EPS
-      ELSE IF( LSAME( CMACH, 'S' ) ) THEN
-         RMACH = SFMIN
-      ELSE IF( LSAME( CMACH, 'B' ) ) THEN
-         RMACH = BASE
-      ELSE IF( LSAME( CMACH, 'P' ) ) THEN
-         RMACH = PREC
-      ELSE IF( LSAME( CMACH, 'N' ) ) THEN
-         RMACH = T
-      ELSE IF( LSAME( CMACH, 'R' ) ) THEN
-         RMACH = RND
-      ELSE IF( LSAME( CMACH, 'M' ) ) THEN
-         RMACH = EMIN
-      ELSE IF( LSAME( CMACH, 'U' ) ) THEN
-         RMACH = RMIN
-      ELSE IF( LSAME( CMACH, 'L' ) ) THEN
-         RMACH = EMAX
-      ELSE IF( LSAME( CMACH, 'O' ) ) THEN
-         RMACH = RMAX
-      END IF
-*
-      DLAMCH = RMACH
-      RETURN
-*
-*     End of DLAMCH
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC1( BETA, T, RND, IEEE1 )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      LOGICAL            IEEE1, RND
-      INTEGER            BETA, T
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC1 determines the machine parameters given by BETA, T, RND, and
-*  IEEE1.
-*
-*  Arguments
-*  =========
-*
-*  BETA    (output) INTEGER
-*          The base of the machine.
-*
-*  T       (output) INTEGER
-*          The number of ( BETA ) digits in the mantissa.
-*
-*  RND     (output) LOGICAL
-*          Specifies whether proper rounding  ( RND = .TRUE. )  or
-*          chopping  ( RND = .FALSE. )  occurs in addition. This may not
-*          be a reliable guide to the way in which the machine performs
-*          its arithmetic.
-*
-*  IEEE1   (output) LOGICAL
-*          Specifies whether rounding appears to be done in the IEEE
-*          'round to nearest' style.
-*
-*  Further Details
-*  ===============
-*
-*  The routine is based on the routine  ENVRON  by Malcolm and
-*  incorporates suggestions by Gentleman and Marovich. See
-*
-*     Malcolm M. A. (1972) Algorithms to reveal properties of
-*        floating-point arithmetic. Comms. of the ACM, 15, 949-951.
-*
-*     Gentleman W. M. and Marovich S. B. (1974) More on algorithms
-*        that reveal properties of floating point arithmetic units.
-*        Comms. of the ACM, 17, 276-277.
-*
-* =====================================================================
-*
-*     .. Local Scalars ..
-      LOGICAL            FIRST, LIEEE1, LRND
-      INTEGER            LBETA, LT
-      DOUBLE PRECISION   A, B, C, F, ONE, QTR, SAVEC, T1, T2
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. Save statement ..
-      SAVE               FIRST, LIEEE1, LBETA, LRND, LT
-*     ..
-*     .. Data statements ..
-      DATA               FIRST / .TRUE. /
-*     ..
-*     .. Executable Statements ..
-*
-      IF( FIRST ) THEN
-         FIRST = .FALSE.
-         ONE = 1
-*
-*        LBETA,  LIEEE1,  LT and  LRND  are the  local values  of  BETA,
-*        IEEE1, T and RND.
-*
-*        Throughout this routine  we use the function  DLAMC3  to ensure
-*        that relevant values are  stored and not held in registers,  or
-*        are not affected by optimizers.
-*
-*        Compute  a = 2.0**m  with the  smallest positive integer m such
-*        that
-*
-*           fl( a + 1.0 ) = a.
-*
-         A = 1
-         C = 1
-*
-*+       WHILE( C.EQ.ONE )LOOP
-   10    CONTINUE
-         IF( C.EQ.ONE ) THEN
-            A = 2*A
-            C = DLAMC3( A, ONE )
-            C = DLAMC3( C, -A )
-            GO TO 10
-         END IF
-*+       END WHILE
-*
-*        Now compute  b = 2.0**m  with the smallest positive integer m
-*        such that
-*
-*           fl( a + b ) .gt. a.
-*
-         B = 1
-         C = DLAMC3( A, B )
-*
-*+       WHILE( C.EQ.A )LOOP
-   20    CONTINUE
-         IF( C.EQ.A ) THEN
-            B = 2*B
-            C = DLAMC3( A, B )
-            GO TO 20
-         END IF
-*+       END WHILE
-*
-*        Now compute the base.  a and c  are neighbouring floating point
-*        numbers  in the  interval  ( beta**t, beta**( t + 1 ) )  and so
-*        their difference is beta. Adding 0.25 to c is to ensure that it
-*        is truncated to beta and not ( beta - 1 ).
-*
-         QTR = ONE / 4
-         SAVEC = C
-         C = DLAMC3( C, -A )
-         LBETA = C + QTR
-*
-*        Now determine whether rounding or chopping occurs,  by adding a
-*        bit  less  than  beta/2  and a  bit  more  than  beta/2  to  a.
-*
-         B = LBETA
-         F = DLAMC3( B / 2, -B / 100 )
-         C = DLAMC3( F, A )
-         IF( C.EQ.A ) THEN
-            LRND = .TRUE.
-         ELSE
-            LRND = .FALSE.
-         END IF
-         F = DLAMC3( B / 2, B / 100 )
-         C = DLAMC3( F, A )
-         IF( ( LRND ) .AND. ( C.EQ.A ) )
-     $      LRND = .FALSE.
-*
-*        Try and decide whether rounding is done in the  IEEE  'round to
-*        nearest' style. B/2 is half a unit in the last place of the two
-*        numbers A and SAVEC. Furthermore, A is even, i.e. has last  bit
-*        zero, and SAVEC is odd. Thus adding B/2 to A should not  change
-*        A, but adding B/2 to SAVEC should change SAVEC.
-*
-         T1 = DLAMC3( B / 2, A )
-         T2 = DLAMC3( B / 2, SAVEC )
-         LIEEE1 = ( T1.EQ.A ) .AND. ( T2.GT.SAVEC ) .AND. LRND
-*
-*        Now find  the  mantissa, t.  It should  be the  integer part of
-*        log to the base beta of a,  however it is safer to determine  t
-*        by powering.  So we find t as the smallest positive integer for
-*        which
-*
-*           fl( beta**t + 1.0 ) = 1.0.
-*
-         LT = 0
-         A = 1
-         C = 1
-*
-*+       WHILE( C.EQ.ONE )LOOP
-   30    CONTINUE
-         IF( C.EQ.ONE ) THEN
-            LT = LT + 1
-            A = A*LBETA
-            C = DLAMC3( A, ONE )
-            C = DLAMC3( C, -A )
-            GO TO 30
-         END IF
-*+       END WHILE
-*
-      END IF
-*
-      BETA = LBETA
-      T = LT
-      RND = LRND
-      IEEE1 = LIEEE1
-      RETURN
-*
-*     End of DLAMC1
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC2( BETA, T, RND, EPS, EMIN, RMIN, EMAX, RMAX )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      LOGICAL            RND
-      INTEGER            BETA, EMAX, EMIN, T
-      DOUBLE PRECISION   EPS, RMAX, RMIN
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC2 determines the machine parameters specified in its argument
-*  list.
-*
-*  Arguments
-*  =========
-*
-*  BETA    (output) INTEGER
-*          The base of the machine.
-*
-*  T       (output) INTEGER
-*          The number of ( BETA ) digits in the mantissa.
-*
-*  RND     (output) LOGICAL
-*          Specifies whether proper rounding  ( RND = .TRUE. )  or
-*          chopping  ( RND = .FALSE. )  occurs in addition. This may not
-*          be a reliable guide to the way in which the machine performs
-*          its arithmetic.
-*
-*  EPS     (output) DOUBLE PRECISION
-*          The smallest positive number such that
-*
-*             fl( 1.0 - EPS ) .LT. 1.0,
-*
-*          where fl denotes the computed value.
-*
-*  EMIN    (output) INTEGER
-*          The minimum exponent before (gradual) underflow occurs.
-*
-*  RMIN    (output) DOUBLE PRECISION
-*          The smallest normalized number for the machine, given by
-*          BASE**( EMIN - 1 ), where  BASE  is the floating point value
-*          of BETA.
-*
-*  EMAX    (output) INTEGER
-*          The maximum exponent before overflow occurs.
-*
-*  RMAX    (output) DOUBLE PRECISION
-*          The largest positive number for the machine, given by
-*          BASE**EMAX * ( 1 - EPS ), where  BASE  is the floating point
-*          value of BETA.
-*
-*  Further Details
-*  ===============
-*
-*  The computation of  EPS  is based on a routine PARANOIA by
-*  W. Kahan of the University of California at Berkeley.
-*
-* =====================================================================
-*
-*     .. Local Scalars ..
-      LOGICAL            FIRST, IEEE, IWARN, LIEEE1, LRND
-      INTEGER            GNMIN, GPMIN, I, LBETA, LEMAX, LEMIN, LT,
-     $                   NGNMIN, NGPMIN
-      DOUBLE PRECISION   A, B, C, HALF, LEPS, LRMAX, LRMIN, ONE, RBASE,
-     $                   SIXTH, SMALL, THIRD, TWO, ZERO
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DLAMC1, DLAMC4, DLAMC5
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, MIN
-*     ..
-*     .. Save statement ..
-      SAVE               FIRST, IWARN, LBETA, LEMAX, LEMIN, LEPS, LRMAX,
-     $                   LRMIN, LT
-*     ..
-*     .. Data statements ..
-      DATA               FIRST / .TRUE. / , IWARN / .FALSE. /
-*     ..
-*     .. Executable Statements ..
-*
-      IF( FIRST ) THEN
-         FIRST = .FALSE.
-         ZERO = 0
-         ONE = 1
-         TWO = 2
-*
-*        LBETA, LT, LRND, LEPS, LEMIN and LRMIN  are the local values of
-*        BETA, T, RND, EPS, EMIN and RMIN.
-*
-*        Throughout this routine  we use the function  DLAMC3  to ensure
-*        that relevant values are stored  and not held in registers,  or
-*        are not affected by optimizers.
-*
-*        DLAMC1 returns the parameters  LBETA, LT, LRND and LIEEE1.
-*
-         CALL DLAMC1( LBETA, LT, LRND, LIEEE1 )
-*
-*        Start to find EPS.
-*
-         B = LBETA
-         A = B**( -LT )
-         LEPS = A
-*
-*        Try some tricks to see whether or not this is the correct  EPS.
-*
-         B = TWO / 3
-         HALF = ONE / 2
-         SIXTH = DLAMC3( B, -HALF )
-         THIRD = DLAMC3( SIXTH, SIXTH )
-         B = DLAMC3( THIRD, -HALF )
-         B = DLAMC3( B, SIXTH )
-         B = ABS( B )
-         IF( B.LT.LEPS )
-     $      B = LEPS
-*
-         LEPS = 1
-*
-*+       WHILE( ( LEPS.GT.B ).AND.( B.GT.ZERO ) )LOOP
-   10    CONTINUE
-         IF( ( LEPS.GT.B ) .AND. ( B.GT.ZERO ) ) THEN
-            LEPS = B
-            C = DLAMC3( HALF*LEPS, ( TWO**5 )*( LEPS**2 ) )
-            C = DLAMC3( HALF, -C )
-            B = DLAMC3( HALF, C )
-            C = DLAMC3( HALF, -B )
-            B = DLAMC3( HALF, C )
-            GO TO 10
-         END IF
-*+       END WHILE
-*
-         IF( A.LT.LEPS )
-     $      LEPS = A
-*
-*        Computation of EPS complete.
-*
-*        Now find  EMIN.  Let A = + or - 1, and + or - (1 + BASE**(-3)).
-*        Keep dividing  A by BETA until (gradual) underflow occurs. This
-*        is detected when we cannot recover the previous A.
-*
-         RBASE = ONE / LBETA
-         SMALL = ONE
-         DO 20 I = 1, 3
-            SMALL = DLAMC3( SMALL*RBASE, ZERO )
-   20    CONTINUE
-         A = DLAMC3( ONE, SMALL )
-         CALL DLAMC4( NGPMIN, ONE, LBETA )
-         CALL DLAMC4( NGNMIN, -ONE, LBETA )
-         CALL DLAMC4( GPMIN, A, LBETA )
-         CALL DLAMC4( GNMIN, -A, LBETA )
-         IEEE = .FALSE.
-*
-         IF( ( NGPMIN.EQ.NGNMIN ) .AND. ( GPMIN.EQ.GNMIN ) ) THEN
-            IF( NGPMIN.EQ.GPMIN ) THEN
-               LEMIN = NGPMIN
-*            ( Non twos-complement machines, no gradual underflow;
-*              e.g.,  VAX )
-            ELSE IF( ( GPMIN-NGPMIN ).EQ.3 ) THEN
-               LEMIN = NGPMIN - 1 + LT
-               IEEE = .TRUE.
-*            ( Non twos-complement machines, with gradual underflow;
-*              e.g., IEEE standard followers )
-            ELSE
-               LEMIN = MIN( NGPMIN, GPMIN )
-*            ( A guess; no known machine )
-               IWARN = .TRUE.
-            END IF
-*
-         ELSE IF( ( NGPMIN.EQ.GPMIN ) .AND. ( NGNMIN.EQ.GNMIN ) ) THEN
-            IF( ABS( NGPMIN-NGNMIN ).EQ.1 ) THEN
-               LEMIN = MAX( NGPMIN, NGNMIN )
-*            ( Twos-complement machines, no gradual underflow;
-*              e.g., CYBER 205 )
-            ELSE
-               LEMIN = MIN( NGPMIN, NGNMIN )
-*            ( A guess; no known machine )
-               IWARN = .TRUE.
-            END IF
-*
-         ELSE IF( ( ABS( NGPMIN-NGNMIN ).EQ.1 ) .AND.
-     $            ( GPMIN.EQ.GNMIN ) ) THEN
-            IF( ( GPMIN-MIN( NGPMIN, NGNMIN ) ).EQ.3 ) THEN
-               LEMIN = MAX( NGPMIN, NGNMIN ) - 1 + LT
-*            ( Twos-complement machines with gradual underflow;
-*              no known machine )
-            ELSE
-               LEMIN = MIN( NGPMIN, NGNMIN )
-*            ( A guess; no known machine )
-               IWARN = .TRUE.
-            END IF
-*
-         ELSE
-            LEMIN = MIN( NGPMIN, NGNMIN, GPMIN, GNMIN )
-*         ( A guess; no known machine )
-            IWARN = .TRUE.
-         END IF
-***
-* Comment out this if block if EMIN is ok
-         IF( IWARN ) THEN
-            FIRST = .TRUE.
-            WRITE( 6, FMT = 9999 )LEMIN
-         END IF
-***
-*
-*        Assume IEEE arithmetic if we found denormalised  numbers above,
-*        or if arithmetic seems to round in the  IEEE style,  determined
-*        in routine DLAMC1. A true IEEE machine should have both  things
-*        true; however, faulty machines may have one or the other.
-*
-         IEEE = IEEE .OR. LIEEE1
-*
-*        Compute  RMIN by successive division by  BETA. We could compute
-*        RMIN as BASE**( EMIN - 1 ),  but some machines underflow during
-*        this computation.
-*
-         LRMIN = 1
-         DO 30 I = 1, 1 - LEMIN
-            LRMIN = DLAMC3( LRMIN*RBASE, ZERO )
-   30    CONTINUE
-*
-*        Finally, call DLAMC5 to compute EMAX and RMAX.
-*
-         CALL DLAMC5( LBETA, LT, LEMIN, IEEE, LEMAX, LRMAX )
-      END IF
-*
-      BETA = LBETA
-      T = LT
-      RND = LRND
-      EPS = LEPS
-      EMIN = LEMIN
-      RMIN = LRMIN
-      EMAX = LEMAX
-      RMAX = LRMAX
-*
-      RETURN
-*
- 9999 FORMAT( / / ' WARNING. The value EMIN may be incorrect:-',
-     $      '  EMIN = ', I8, /
-     $      ' If, after inspection, the value EMIN looks',
-     $      ' acceptable please comment out ',
-     $      / ' the IF block as marked within the code of routine',
-     $      ' DLAMC2,', / ' otherwise supply EMIN explicitly.', / )
-*
-*     End of DLAMC2
-*
-      END
-*
-************************************************************************
-*
-      DOUBLE PRECISION FUNCTION DLAMC3( A, B )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   A, B
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC3  is intended to force  A  and  B  to be stored prior to doing
-*  the addition of  A  and  B ,  for use in situations where optimizers
-*  might hold one of these in a register.
-*
-*  Arguments
-*  =========
-*
-*  A, B    (input) DOUBLE PRECISION
-*          The values A and B.
-*
-* =====================================================================
-*
-*     .. Executable Statements ..
-*
-      DLAMC3 = A + B
-*
-      RETURN
-*
-*     End of DLAMC3
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC4( EMIN, START, BASE )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      INTEGER            BASE, EMIN
-      DOUBLE PRECISION   START
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC4 is a service routine for DLAMC2.
-*
-*  Arguments
-*  =========
-*
-*  EMIN    (output) EMIN
-*          The minimum exponent before (gradual) underflow, computed by
-*          setting A = START and dividing by BASE until the previous A
-*          can not be recovered.
-*
-*  START   (input) DOUBLE PRECISION
-*          The starting point for determining EMIN.
-*
-*  BASE    (input) INTEGER
-*          The base of the machine.
-*
-* =====================================================================
-*
-*     .. Local Scalars ..
-      INTEGER            I
-      DOUBLE PRECISION   A, B1, B2, C1, C2, D1, D2, ONE, RBASE, ZERO
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. Executable Statements ..
-*
-      A = START
-      ONE = 1
-      RBASE = ONE / BASE
-      ZERO = 0
-      EMIN = 1
-      B1 = DLAMC3( A*RBASE, ZERO )
-      C1 = A
-      C2 = A
-      D1 = A
-      D2 = A
-*+    WHILE( ( C1.EQ.A ).AND.( C2.EQ.A ).AND.
-*    $       ( D1.EQ.A ).AND.( D2.EQ.A )      )LOOP
-   10 CONTINUE
-      IF( ( C1.EQ.A ) .AND. ( C2.EQ.A ) .AND. ( D1.EQ.A ) .AND.
-     $    ( D2.EQ.A ) ) THEN
-         EMIN = EMIN - 1
-         A = B1
-         B1 = DLAMC3( A / BASE, ZERO )
-         C1 = DLAMC3( B1*BASE, ZERO )
-         D1 = ZERO
-         DO 20 I = 1, BASE
-            D1 = D1 + B1
-   20    CONTINUE
-         B2 = DLAMC3( A*RBASE, ZERO )
-         C2 = DLAMC3( B2 / RBASE, ZERO )
-         D2 = ZERO
-         DO 30 I = 1, BASE
-            D2 = D2 + B2
-   30    CONTINUE
-         GO TO 10
-      END IF
-*+    END WHILE
-*
-      RETURN
-*
-*     End of DLAMC4
-*
-      END
-*
-************************************************************************
-*
-      SUBROUTINE DLAMC5( BETA, P, EMIN, IEEE, EMAX, RMAX )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      LOGICAL            IEEE
-      INTEGER            BETA, EMAX, EMIN, P
-      DOUBLE PRECISION   RMAX
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAMC5 attempts to compute RMAX, the largest machine floating-point
-*  number, without overflow.  It assumes that EMAX + abs(EMIN) sum
-*  approximately to a power of 2.  It will fail on machines where this
-*  assumption does not hold, for example, the Cyber 205 (EMIN = -28625,
-*  EMAX = 28718).  It will also fail if the value supplied for EMIN is
-*  too large (i.e. too close to zero), probably with overflow.
-*
-*  Arguments
-*  =========
-*
-*  BETA    (input) INTEGER
-*          The base of floating-point arithmetic.
-*
-*  P       (input) INTEGER
-*          The number of base BETA digits in the mantissa of a
-*          floating-point value.
-*
-*  EMIN    (input) INTEGER
-*          The minimum exponent before (gradual) underflow.
-*
-*  IEEE    (input) LOGICAL
-*          A logical flag specifying whether or not the arithmetic
-*          system is thought to comply with the IEEE standard.
-*
-*  EMAX    (output) INTEGER
-*          The largest exponent before overflow
-*
-*  RMAX    (output) DOUBLE PRECISION
-*          The largest machine floating-point number.
-*
-* =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO, ONE
-      PARAMETER          ( ZERO = 0.0D0, ONE = 1.0D0 )
-*     ..
-*     .. Local Scalars ..
-      INTEGER            EXBITS, EXPSUM, I, LEXP, NBITS, TRY, UEXP
-      DOUBLE PRECISION   OLDY, RECBAS, Y, Z
-*     ..
-*     .. External Functions ..
-      DOUBLE PRECISION   DLAMC3
-      EXTERNAL           DLAMC3
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          MOD
-*     ..
-*     .. Executable Statements ..
-*
-*     First compute LEXP and UEXP, two powers of 2 that bound
-*     abs(EMIN). We then assume that EMAX + abs(EMIN) will sum
-*     approximately to the bound that is closest to abs(EMIN).
-*     (EMAX is the exponent of the required number RMAX).
-*
-      LEXP = 1
-      EXBITS = 1
-   10 CONTINUE
-      TRY = LEXP*2
-      IF( TRY.LE.( -EMIN ) ) THEN
-         LEXP = TRY
-         EXBITS = EXBITS + 1
-         GO TO 10
-      END IF
-      IF( LEXP.EQ.-EMIN ) THEN
-         UEXP = LEXP
-      ELSE
-         UEXP = TRY
-         EXBITS = EXBITS + 1
-      END IF
-*
-*     Now -LEXP is less than or equal to EMIN, and -UEXP is greater
-*     than or equal to EMIN. EXBITS is the number of bits needed to
-*     store the exponent.
-*
-      IF( ( UEXP+EMIN ).GT.( -LEXP-EMIN ) ) THEN
-         EXPSUM = 2*LEXP
-      ELSE
-         EXPSUM = 2*UEXP
-      END IF
-*
-*     EXPSUM is the exponent range, approximately equal to
-*     EMAX - EMIN + 1 .
-*
-      EMAX = EXPSUM + EMIN - 1
-      NBITS = 1 + EXBITS + P
-*
-*     NBITS is the total number of bits needed to store a
-*     floating-point number.
-*
-      IF( ( MOD( NBITS, 2 ).EQ.1 ) .AND. ( BETA.EQ.2 ) ) THEN
-*
-*        Either there are an odd number of bits used to store a
-*        floating-point number, which is unlikely, or some bits are
-*        not used in the representation of numbers, which is possible,
-*        (e.g. Cray machines) or the mantissa has an implicit bit,
-*        (e.g. IEEE machines, Dec Vax machines), which is perhaps the
-*        most likely. We have to assume the last alternative.
-*        If this is true, then we need to reduce EMAX by one because
-*        there must be some way of representing zero in an implicit-bit
-*        system. On machines like Cray, we are reducing EMAX by one
-*        unnecessarily.
-*
-         EMAX = EMAX - 1
-      END IF
-*
-      IF( IEEE ) THEN
-*
-*        Assume we are on an IEEE machine which reserves one exponent
-*        for infinity and NaN.
-*
-         EMAX = EMAX - 1
-      END IF
-*
-*     Now create RMAX, the largest machine number, which should
-*     be equal to (1.0 - BETA**(-P)) * BETA**EMAX .
-*
-*     First compute 1.0 - BETA**(-P), being careful that the
-*     result is less than 1.0 .
-*
-      RECBAS = ONE / BETA
-      Z = BETA - ONE
-      Y = ZERO
-      DO 20 I = 1, P
-         Z = Z*RECBAS
-         IF( Y.LT.ONE )
-     $      OLDY = Y
-         Y = DLAMC3( Y, Z )
-   20 CONTINUE
-      IF( Y.GE.ONE )
-     $   Y = OLDY
-*
-*     Now multiply by BETA**EMAX to get RMAX.
-*
-      DO 30 I = 1, EMAX
-         Y = DLAMC3( Y*BETA, ZERO )
-   30 CONTINUE
-*
-      RMAX = Y
-      RETURN
-*
-*     End of DLAMC5
-*
-      END
-      SUBROUTINE DLARF( SIDE, M, N, V, INCV, TAU, C, LDC, WORK )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     February 29, 1992
-*
-*     .. Scalar Arguments ..
-      CHARACTER          SIDE
-      INTEGER            INCV, LDC, M, N
-      DOUBLE PRECISION   TAU
-*     ..
-*     .. Array Arguments ..
-      DOUBLE PRECISION   C( LDC, * ), V( * ), WORK( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLARF applies a real elementary reflector H to a real m by n matrix
-*  C, from either the left or the right. H is represented in the form
-*
-*        H = I - tau * v * v'
-*
-*  where tau is a real scalar and v is a real vector.
-*
-*  If tau = 0, then H is taken to be the unit matrix.
-*
-*  Arguments
-*  =========
-*
-*  SIDE    (input) CHARACTER*1
-*          = 'L': form  H * C
-*          = 'R': form  C * H
-*
-*  M       (input) INTEGER
-*          The number of rows of the matrix C.
-*
-*  N       (input) INTEGER
-*          The number of columns of the matrix C.
-*
-*  V       (input) DOUBLE PRECISION array, dimension
-*                     (1 + (M-1)*abs(INCV)) if SIDE = 'L'
-*                  or (1 + (N-1)*abs(INCV)) if SIDE = 'R'
-*          The vector v in the representation of H. V is not used if
-*          TAU = 0.
-*
-*  INCV    (input) INTEGER
-*          The increment between elements of v. INCV <> 0.
-*
-*  TAU     (input) DOUBLE PRECISION
-*          The value tau in the representation of H.
-*
-*  C       (input/output) DOUBLE PRECISION array, dimension (LDC,N)
-*          On entry, the m by n matrix C.
-*          On exit, C is overwritten by the matrix H * C if SIDE = 'L',
-*          or C * H if SIDE = 'R'.
-*
-*  LDC     (input) INTEGER
-*          The leading dimension of the array C. LDC >= max(1,M).
-*
-*  WORK    (workspace) DOUBLE PRECISION array, dimension
-*                         (N) if SIDE = 'L'
-*                      or (M) if SIDE = 'R'
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE, ZERO
-      PARAMETER          ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. External Subroutines ..
-      EXTERNAL           DGEMV, DGER
-*     ..
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     ..
-*     .. Executable Statements ..
-*
-      IF( LSAME( SIDE, 'L' ) ) THEN
-*
-*        Form  H * C
-*
-         IF( TAU.NE.ZERO ) THEN
-*
-*           w := C' * v
-*
-            CALL DGEMV( 'Transpose', M, N, ONE, C, LDC, V, INCV, ZERO,
-     $                  WORK, 1 )
-*
-*           C := C - v * w'
-*
-            CALL DGER( M, N, -TAU, V, INCV, WORK, 1, C, LDC )
-         END IF
-      ELSE
-*
-*        Form  C * H
-*
-         IF( TAU.NE.ZERO ) THEN
-*
-*           w := C * v
-*
-            CALL DGEMV( 'No transpose', M, N, ONE, C, LDC, V, INCV,
-     $                  ZERO, WORK, 1 )
-*
-*           C := C - w * v'
-*
-            CALL DGER( M, N, -TAU, WORK, 1, V, INCV, C, LDC )
-         END IF
-      END IF
-      RETURN
-*
-*     End of DLARF
-*
-      END
-      DOUBLE PRECISION FUNCTION DLAPY2( X, Y )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   X, Y
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLAPY2 returns sqrt(x**2+y**2), taking care not to cause unnecessary
-*  overflow.
-*
-*  Arguments
-*  =========
-*
-*  X       (input) DOUBLE PRECISION
-*  Y       (input) DOUBLE PRECISION
-*          X and Y specify the values x and y.
-*
-*  =====================================================================
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER          ( ZERO = 0.0D0 )
-      DOUBLE PRECISION   ONE
-      PARAMETER          ( ONE = 1.0D0 )
-*     ..
-*     .. Local Scalars ..
-      DOUBLE PRECISION   W, XABS, YABS, Z
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS, MAX, MIN, SQRT
-*     ..
-*     .. Executable Statements ..
-*
-      XABS = ABS( X )
-      YABS = ABS( Y )
-      W = MAX( XABS, YABS )
-      Z = MIN( XABS, YABS )
-      IF( Z.EQ.ZERO ) THEN
-         DLAPY2 = W
-      ELSE
-         DLAPY2 = W*SQRT( ONE+( Z / W )**2 )
-      END IF
-      RETURN
-*
-*     End of DLAPY2
-*
-      END
-      SUBROUTINE ZGERC ( M, N, ALPHA, X, INCX, Y, INCY, A, LDA )
-*     .. Scalar Arguments ..
-      COMPLEX*16         ALPHA
-      INTEGER            INCX, INCY, LDA, M, N
-*     .. Array Arguments ..
-      COMPLEX*16         A( LDA, * ), X( * ), Y( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  ZGERC  performs the rank 1 operation
-*
-*     A := alpha*x*conjg( y' ) + A,
-*
-*  where alpha is a scalar, x is an m element vector, y is an n element
-*  vector and A is an m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of the matrix A.
-*           M must be at least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - COMPLEX*16      .
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  X      - COMPLEX*16       array of dimension at least
-*           ( 1 + ( m - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the m
-*           element vector x.
-*           Unchanged on exit.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*  Y      - COMPLEX*16       array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCY ) ).
-*           Before entry, the incremented array Y must contain the n
-*           element vector y.
-*           Unchanged on exit.
-*
-*  INCY   - INTEGER.
-*           On entry, INCY specifies the increment for the elements of
-*           Y. INCY must not be zero.
-*           Unchanged on exit.
-*
-*  A      - COMPLEX*16       array of DIMENSION ( LDA, n ).
-*           Before entry, the leading m by n part of the array A must
-*           contain the matrix of coefficients. On exit, A is
-*           overwritten by the updated matrix.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      COMPLEX*16         ZERO
-      PARAMETER        ( ZERO = ( 0.0D+0, 0.0D+0 ) )
-*     .. Local Scalars ..
-      COMPLEX*16         TEMP
-      INTEGER            I, INFO, IX, J, JY, KX
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          DCONJG, MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( M.LT.0 )THEN
-         INFO = 1
-      ELSE IF( N.LT.0 )THEN
-         INFO = 2
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 5
-      ELSE IF( INCY.EQ.0 )THEN
-         INFO = 7
-      ELSE IF( LDA.LT.MAX( 1, M ) )THEN
-         INFO = 9
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'ZGERC ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.( ALPHA.EQ.ZERO ) )
-     $   RETURN
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( INCY.GT.0 )THEN
-         JY = 1
-      ELSE
-         JY = 1 - ( N - 1 )*INCY
-      END IF
-      IF( INCX.EQ.1 )THEN
-         DO 20, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*DCONJG( Y( JY ) )
-               DO 10, I = 1, M
-                  A( I, J ) = A( I, J ) + X( I )*TEMP
-   10          CONTINUE
-            END IF
-            JY = JY + INCY
-   20    CONTINUE
-      ELSE
-         IF( INCX.GT.0 )THEN
-            KX = 1
-         ELSE
-            KX = 1 - ( M - 1 )*INCX
-         END IF
-         DO 40, J = 1, N
-            IF( Y( JY ).NE.ZERO )THEN
-               TEMP = ALPHA*DCONJG( Y( JY ) )
-               IX   = KX
-               DO 30, I = 1, M
-                  A( I, J ) = A( I, J ) + X( IX )*TEMP
-                  IX        = IX        + INCX
-   30          CONTINUE
-            END IF
-            JY = JY + INCY
-   40    CONTINUE
-      END IF
-*
-      RETURN
-*
-*     End of ZGERC .
-*
-      END
-      double precision function dznrm2( n, zx, incx)
-      logical imag, scale
-      integer i, incx, ix, n, next
-      double precision cutlo, cuthi, hitest, sum, xmax, absx, zero, one
-      double complex      zx(1)
-      double precision dreal,dimag
-      double complex zdumr,zdumi
-      dreal(zdumr) = zdumr
-      dimag(zdumi) = (0.0d0,-1.0d0)*zdumi
-      data         zero, one /0.0d0, 1.0d0/
-c
-c     unitary norm of the complex n-vector stored in zx() with storage
-c     increment incx .
-c     if    n .le. 0 return with result = 0.
-c     if n .ge. 1 then incx must be .ge. 1
-c
-c           c.l.lawson , 1978 jan 08
-c     modified to correct problem with negative increment, 8/21/90.
-c
-c     four phase method     using two built-in constants that are
-c     hopefully applicable to all machines.
-c         cutlo = maximum of  sqrt(u/eps)  over all known machines.
-c         cuthi = minimum of  sqrt(v)      over all known machines.
-c     where
-c         eps = smallest no. such that eps + 1. .gt. 1.
-c         u   = smallest positive no.   (underflow limit)
-c         v   = largest  no.            (overflow  limit)
-c
-c     brief outline of algorithm..
-c
-c     phase 1    scans zero components.
-c     move to phase 2 when a component is nonzero and .le. cutlo
-c     move to phase 3 when a component is .gt. cutlo
-c     move to phase 4 when a component is .ge. cuthi/m
-c     where m = n for x() real and m = 2*n for complex.
-c
-c     values for cutlo and cuthi..
-c     from the environmental parameters listed in the imsl converter
-c     document the limiting values are as follows..
-c     cutlo, s.p.   u/eps = 2**(-102) for  honeywell.  close seconds are
-c                   univac and dec at 2**(-103)
-c                   thus cutlo = 2**(-51) = 4.44089e-16
-c     cuthi, s.p.   v = 2**127 for univac, honeywell, and dec.
-c                   thus cuthi = 2**(63.5) = 1.30438e19
-c     cutlo, d.p.   u/eps = 2**(-67) for honeywell and dec.
-c                   thus cutlo = 2**(-33.5) = 8.23181d-11
-c     cuthi, d.p.   same as s.p.  cuthi = 1.30438d19
-c     data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c     data cutlo, cuthi / 4.441e-16,  1.304e19 /
-      data cutlo, cuthi / 8.232d-11,  1.304d19 /
-c
-      if(n .gt. 0) go to 10
-         dznrm2  = zero
-         go to 300
-c
-   10 assign 30 to next
-      sum = zero
-      i = 1
-      if( incx .lt. 0 )i = (-n+1)*incx + 1
-c                                                 begin main loop
-      do 220 ix = 1,n
-         absx = dabs(dreal(zx(i)))
-         imag = .false.
-         go to next,(30, 50, 70, 90, 110)
-   30 if( absx .gt. cutlo) go to 85
-      assign 50 to next
-      scale = .false.
-c
-c                        phase 1.  sum is zero
-c
-   50 if( absx .eq. zero) go to 200
-      if( absx .gt. cutlo) go to 85
-c
-c                                prepare for phase 2.
-      assign 70 to next
-      go to 105
-c
-c                                prepare for phase 4.
-c
-  100 assign 110 to next
-      sum = (sum / absx) / absx
-  105 scale = .true.
-      xmax = absx
-      go to 115
-c
-c                   phase 2.  sum is small.
-c                             scale to avoid destructive underflow.
-c
-   70 if( absx .gt. cutlo ) go to 75
-c
-c                     common code for phases 2 and 4.
-c                     in phase 4 sum is large.  scale to avoid overflow.
-c
-  110 if( absx .le. xmax ) go to 115
-         sum = one + sum * (xmax / absx)**2
-         xmax = absx
-         go to 200
-c
-  115 sum = sum + (absx/xmax)**2
-      go to 200
-c
-c
-c                  prepare for phase 3.
-c
-   75 sum = (sum * xmax) * xmax
-c
-   85 assign 90 to next
-      scale = .false.
-c
-c     for real or d.p. set hitest = cuthi/n
-c     for complex      set hitest = cuthi/(2*n)
-c
-      hitest = cuthi/dble( 2*n )
-c
-c                   phase 3.  sum is mid-range.  no scaling.
-c
-   90 if(absx .ge. hitest) go to 100
-         sum = sum + absx**2
-  200 continue
-c                  control selection of real and imaginary parts.
-c
-      if(imag) go to 210
-         absx = dabs(dimag(zx(i)))
-         imag = .true.
-      go to next,(  50, 70, 90, 110 )
-c
-  210 continue
-      i = i + incx
-  220 continue
-c
-c              end of main loop.
-c              compute square root and adjust for scaling.
-c
-      dznrm2 = dsqrt(sum)
-      if(scale) dznrm2 = dznrm2 * xmax
-  300 continue
-      return
-      end
-      SUBROUTINE DTRMV ( UPLO, TRANS, DIAG, N, A, LDA, X, INCX )
-*     .. Scalar Arguments ..
-      INTEGER            INCX, LDA, N
-      CHARACTER*1        DIAG, TRANS, UPLO
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), X( * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DTRMV  performs one of the matrix-vector operations
-*
-*     x := A*x,   or   x := A'*x,
-*
-*  where x is an n element vector and  A is an n by n unit, or non-unit,
-*  upper or lower triangular matrix.
-*
-*  Parameters
-*  ==========
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANS  - CHARACTER*1.
-*           On entry, TRANS specifies the operation to be performed as
-*           follows:
-*
-*              TRANS = 'N' or 'n'   x := A*x.
-*
-*              TRANS = 'T' or 't'   x := A'*x.
-*
-*              TRANS = 'C' or 'c'   x := A'*x.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit
-*           triangular as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the order of the matrix A.
-*           N must be at least zero.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, n ).
-*           Before entry with  UPLO = 'U' or 'u', the leading n by n
-*           upper triangular part of the array A must contain the upper
-*           triangular matrix and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry with UPLO = 'L' or 'l', the leading n by n
-*           lower triangular part of the array A must contain the lower
-*           triangular matrix and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u', the diagonal elements of
-*           A are not referenced either, but are assumed to be unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. LDA must be at least
-*           max( 1, n ).
-*           Unchanged on exit.
-*
-*  X      - DOUBLE PRECISION array of dimension at least
-*           ( 1 + ( n - 1 )*abs( INCX ) ).
-*           Before entry, the incremented array X must contain the n
-*           element vector x. On exit, X is overwritten with the
-*           tranformed vector x.
-*
-*  INCX   - INTEGER.
-*           On entry, INCX specifies the increment for the elements of
-*           X. INCX must not be zero.
-*           Unchanged on exit.
-*
-*
-*  Level 2 Blas routine.
-*
-*  -- Written on 22-October-1986.
-*     Jack Dongarra, Argonne National Lab.
-*     Jeremy Du Croz, Nag Central Office.
-*     Sven Hammarling, Nag Central Office.
-*     Richard Hanson, Sandia National Labs.
-*
-*
-*     .. Parameters ..
-      DOUBLE PRECISION   ZERO
-      PARAMETER        ( ZERO = 0.0D+0 )
-*     .. Local Scalars ..
-      DOUBLE PRECISION   TEMP
-      INTEGER            I, INFO, IX, J, JX, KX
-      LOGICAL            NOUNIT
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF     ( .NOT.LSAME( UPLO , 'U' ).AND.
-     $         .NOT.LSAME( UPLO , 'L' )      )THEN
-         INFO = 1
-      ELSE IF( .NOT.LSAME( TRANS, 'N' ).AND.
-     $         .NOT.LSAME( TRANS, 'T' ).AND.
-     $         .NOT.LSAME( TRANS, 'C' )      )THEN
-         INFO = 2
-      ELSE IF( .NOT.LSAME( DIAG , 'U' ).AND.
-     $         .NOT.LSAME( DIAG , 'N' )      )THEN
-         INFO = 3
-      ELSE IF( N.LT.0 )THEN
-         INFO = 4
-      ELSE IF( LDA.LT.MAX( 1, N ) )THEN
-         INFO = 6
-      ELSE IF( INCX.EQ.0 )THEN
-         INFO = 8
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DTRMV ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-      NOUNIT = LSAME( DIAG, 'N' )
-*
-*     Set up the start point in X if the increment is not unity. This
-*     will be  ( N - 1 )*INCX  too small for descending loops.
-*
-      IF( INCX.LE.0 )THEN
-         KX = 1 - ( N - 1 )*INCX
-      ELSE IF( INCX.NE.1 )THEN
-         KX = 1
-      END IF
-*
-*     Start the operations. In this version the elements of A are
-*     accessed sequentially with one pass through A.
-*
-      IF( LSAME( TRANS, 'N' ) )THEN
-*
-*        Form  x := A*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 20, J = 1, N
-                  IF( X( J ).NE.ZERO )THEN
-                     TEMP = X( J )
-                     DO 10, I = 1, J - 1
-                        X( I ) = X( I ) + TEMP*A( I, J )
-   10                CONTINUE
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )*A( J, J )
-                  END IF
-   20          CONTINUE
-            ELSE
-               JX = KX
-               DO 40, J = 1, N
-                  IF( X( JX ).NE.ZERO )THEN
-                     TEMP = X( JX )
-                     IX   = KX
-                     DO 30, I = 1, J - 1
-                        X( IX ) = X( IX ) + TEMP*A( I, J )
-                        IX      = IX      + INCX
-   30                CONTINUE
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )*A( J, J )
-                  END IF
-                  JX = JX + INCX
-   40          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 60, J = N, 1, -1
-                  IF( X( J ).NE.ZERO )THEN
-                     TEMP = X( J )
-                     DO 50, I = N, J + 1, -1
-                        X( I ) = X( I ) + TEMP*A( I, J )
-   50                CONTINUE
-                     IF( NOUNIT )
-     $                  X( J ) = X( J )*A( J, J )
-                  END IF
-   60          CONTINUE
-            ELSE
-               KX = KX + ( N - 1 )*INCX
-               JX = KX
-               DO 80, J = N, 1, -1
-                  IF( X( JX ).NE.ZERO )THEN
-                     TEMP = X( JX )
-                     IX   = KX
-                     DO 70, I = N, J + 1, -1
-                        X( IX ) = X( IX ) + TEMP*A( I, J )
-                        IX      = IX      - INCX
-   70                CONTINUE
-                     IF( NOUNIT )
-     $                  X( JX ) = X( JX )*A( J, J )
-                  END IF
-                  JX = JX - INCX
-   80          CONTINUE
-            END IF
-         END IF
-      ELSE
-*
-*        Form  x := A'*x.
-*
-         IF( LSAME( UPLO, 'U' ) )THEN
-            IF( INCX.EQ.1 )THEN
-               DO 100, J = N, 1, -1
-                  TEMP = X( J )
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 90, I = J - 1, 1, -1
-                     TEMP = TEMP + A( I, J )*X( I )
-   90             CONTINUE
-                  X( J ) = TEMP
-  100          CONTINUE
-            ELSE
-               JX = KX + ( N - 1 )*INCX
-               DO 120, J = N, 1, -1
-                  TEMP = X( JX )
-                  IX   = JX
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 110, I = J - 1, 1, -1
-                     IX   = IX   - INCX
-                     TEMP = TEMP + A( I, J )*X( IX )
-  110             CONTINUE
-                  X( JX ) = TEMP
-                  JX      = JX   - INCX
-  120          CONTINUE
-            END IF
-         ELSE
-            IF( INCX.EQ.1 )THEN
-               DO 140, J = 1, N
-                  TEMP = X( J )
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 130, I = J + 1, N
-                     TEMP = TEMP + A( I, J )*X( I )
-  130             CONTINUE
-                  X( J ) = TEMP
-  140          CONTINUE
-            ELSE
-               JX = KX
-               DO 160, J = 1, N
-                  TEMP = X( JX )
-                  IX   = JX
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 150, I = J + 1, N
-                     IX   = IX   + INCX
-                     TEMP = TEMP + A( I, J )*X( IX )
-  150             CONTINUE
-                  X( JX ) = TEMP
-                  JX      = JX   + INCX
-  160          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DTRMV .
-*
-      END
-      SUBROUTINE DTRMM ( SIDE, UPLO, TRANSA, DIAG, M, N, ALPHA, A, LDA,
-     $                   B, LDB )
-*     .. Scalar Arguments ..
-      CHARACTER*1        SIDE, UPLO, TRANSA, DIAG
-      INTEGER            M, N, LDA, LDB
-      DOUBLE PRECISION   ALPHA
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), B( LDB, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DTRMM  performs one of the matrix-matrix operations
-*
-*     B := alpha*op( A )*B,   or   B := alpha*B*op( A ),
-*
-*  where  alpha  is a scalar,  B  is an m by n matrix,  A  is a unit, or
-*  non-unit,  upper or lower triangular matrix  and  op( A )  is one  of
-*
-*     op( A ) = A   or   op( A ) = A'.
-*
-*  Parameters
-*  ==========
-*
-*  SIDE   - CHARACTER*1.
-*           On entry,  SIDE specifies whether  op( A ) multiplies B from
-*           the left or right as follows:
-*
-*              SIDE = 'L' or 'l'   B := alpha*op( A )*B.
-*
-*              SIDE = 'R' or 'r'   B := alpha*B*op( A ).
-*
-*           Unchanged on exit.
-*
-*  UPLO   - CHARACTER*1.
-*           On entry, UPLO specifies whether the matrix A is an upper or
-*           lower triangular matrix as follows:
-*
-*              UPLO = 'U' or 'u'   A is an upper triangular matrix.
-*
-*              UPLO = 'L' or 'l'   A is a lower triangular matrix.
-*
-*           Unchanged on exit.
-*
-*  TRANSA - CHARACTER*1.
-*           On entry, TRANSA specifies the form of op( A ) to be used in
-*           the matrix multiplication as follows:
-*
-*              TRANSA = 'N' or 'n'   op( A ) = A.
-*
-*              TRANSA = 'T' or 't'   op( A ) = A'.
-*
-*              TRANSA = 'C' or 'c'   op( A ) = A'.
-*
-*           Unchanged on exit.
-*
-*  DIAG   - CHARACTER*1.
-*           On entry, DIAG specifies whether or not A is unit triangular
-*           as follows:
-*
-*              DIAG = 'U' or 'u'   A is assumed to be unit triangular.
-*
-*              DIAG = 'N' or 'n'   A is not assumed to be unit
-*                                  triangular.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry, M specifies the number of rows of B. M must be at
-*           least zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry, N specifies the number of columns of B.  N must be
-*           at least zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry,  ALPHA specifies the scalar  alpha. When  alpha is
-*           zero then  A is not referenced and  B need not be set before
-*           entry.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, k ), where k is m
-*           when  SIDE = 'L' or 'l'  and is  n  when  SIDE = 'R' or 'r'.
-*           Before entry  with  UPLO = 'U' or 'u',  the  leading  k by k
-*           upper triangular part of the array  A must contain the upper
-*           triangular matrix  and the strictly lower triangular part of
-*           A is not referenced.
-*           Before entry  with  UPLO = 'L' or 'l',  the  leading  k by k
-*           lower triangular part of the array  A must contain the lower
-*           triangular matrix  and the strictly upper triangular part of
-*           A is not referenced.
-*           Note that when  DIAG = 'U' or 'u',  the diagonal elements of
-*           A  are not referenced either,  but are assumed to be  unity.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program.  When  SIDE = 'L' or 'l'  then
-*           LDA  must be at least  max( 1, m ),  when  SIDE = 'R' or 'r'
-*           then LDA must be at least max( 1, n ).
-*           Unchanged on exit.
-*
-*  B      - DOUBLE PRECISION array of DIMENSION ( LDB, n ).
-*           Before entry,  the leading  m by n part of the array  B must
-*           contain the matrix  B,  and  on exit  is overwritten  by the
-*           transformed matrix.
-*
-*  LDB    - INTEGER.
-*           On entry, LDB specifies the first dimension of B as declared
-*           in  the  calling  (sub)  program.   LDB  must  be  at  least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 3 Blas routine.
-*
-*  -- Written on 8-February-1989.
-*     Jack Dongarra, Argonne National Laboratory.
-*     Iain Duff, AERE Harwell.
-*     Jeremy Du Croz, Numerical Algorithms Group Ltd.
-*     Sven Hammarling, Numerical Algorithms Group Ltd.
-*
-*
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     .. Local Scalars ..
-      LOGICAL            LSIDE, NOUNIT, UPPER
-      INTEGER            I, INFO, J, K, NROWA
-      DOUBLE PRECISION   TEMP
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE         , ZERO
-      PARAMETER        ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Executable Statements ..
-*
-*     Test the input parameters.
-*
-      LSIDE  = LSAME( SIDE  , 'L' )
-      IF( LSIDE )THEN
-         NROWA = M
-      ELSE
-         NROWA = N
-      END IF
-      NOUNIT = LSAME( DIAG  , 'N' )
-      UPPER  = LSAME( UPLO  , 'U' )
-*
-      INFO   = 0
-      IF(      ( .NOT.LSIDE                ).AND.
-     $         ( .NOT.LSAME( SIDE  , 'R' ) )      )THEN
-         INFO = 1
-      ELSE IF( ( .NOT.UPPER                ).AND.
-     $         ( .NOT.LSAME( UPLO  , 'L' ) )      )THEN
-         INFO = 2
-      ELSE IF( ( .NOT.LSAME( TRANSA, 'N' ) ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'T' ) ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'C' ) )      )THEN
-         INFO = 3
-      ELSE IF( ( .NOT.LSAME( DIAG  , 'U' ) ).AND.
-     $         ( .NOT.LSAME( DIAG  , 'N' ) )      )THEN
-         INFO = 4
-      ELSE IF( M  .LT.0               )THEN
-         INFO = 5
-      ELSE IF( N  .LT.0               )THEN
-         INFO = 6
-      ELSE IF( LDA.LT.MAX( 1, NROWA ) )THEN
-         INFO = 9
-      ELSE IF( LDB.LT.MAX( 1, M     ) )THEN
-         INFO = 11
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DTRMM ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( N.EQ.0 )
-     $   RETURN
-*
-*     And when  alpha.eq.zero.
-*
-      IF( ALPHA.EQ.ZERO )THEN
-         DO 20, J = 1, N
-            DO 10, I = 1, M
-               B( I, J ) = ZERO
-   10       CONTINUE
-   20    CONTINUE
-         RETURN
-      END IF
-*
-*     Start the operations.
-*
-      IF( LSIDE )THEN
-         IF( LSAME( TRANSA, 'N' ) )THEN
-*
-*           Form  B := alpha*A*B.
-*
-            IF( UPPER )THEN
-               DO 50, J = 1, N
-                  DO 40, K = 1, M
-                     IF( B( K, J ).NE.ZERO )THEN
-                        TEMP = ALPHA*B( K, J )
-                        DO 30, I = 1, K - 1
-                           B( I, J ) = B( I, J ) + TEMP*A( I, K )
-   30                   CONTINUE
-                        IF( NOUNIT )
-     $                     TEMP = TEMP*A( K, K )
-                        B( K, J ) = TEMP
-                     END IF
-   40             CONTINUE
-   50          CONTINUE
-            ELSE
-               DO 80, J = 1, N
-                  DO 70 K = M, 1, -1
-                     IF( B( K, J ).NE.ZERO )THEN
-                        TEMP      = ALPHA*B( K, J )
-                        B( K, J ) = TEMP
-                        IF( NOUNIT )
-     $                     B( K, J ) = B( K, J )*A( K, K )
-                        DO 60, I = K + 1, M
-                           B( I, J ) = B( I, J ) + TEMP*A( I, K )
-   60                   CONTINUE
-                     END IF
-   70             CONTINUE
-   80          CONTINUE
-            END IF
-         ELSE
-*
-*           Form  B := alpha*B*A'.
-*
-            IF( UPPER )THEN
-               DO 110, J = 1, N
-                  DO 100, I = M, 1, -1
-                     TEMP = B( I, J )
-                     IF( NOUNIT )
-     $                  TEMP = TEMP*A( I, I )
-                     DO 90, K = 1, I - 1
-                        TEMP = TEMP + A( K, I )*B( K, J )
-   90                CONTINUE
-                     B( I, J ) = ALPHA*TEMP
-  100             CONTINUE
-  110          CONTINUE
-            ELSE
-               DO 140, J = 1, N
-                  DO 130, I = 1, M
-                     TEMP = B( I, J )
-                     IF( NOUNIT )
-     $                  TEMP = TEMP*A( I, I )
-                     DO 120, K = I + 1, M
-                        TEMP = TEMP + A( K, I )*B( K, J )
-  120                CONTINUE
-                     B( I, J ) = ALPHA*TEMP
-  130             CONTINUE
-  140          CONTINUE
-            END IF
-         END IF
-      ELSE
-         IF( LSAME( TRANSA, 'N' ) )THEN
-*
-*           Form  B := alpha*B*A.
-*
-            IF( UPPER )THEN
-               DO 180, J = N, 1, -1
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 150, I = 1, M
-                     B( I, J ) = TEMP*B( I, J )
-  150             CONTINUE
-                  DO 170, K = 1, J - 1
-                     IF( A( K, J ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( K, J )
-                        DO 160, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  160                   CONTINUE
-                     END IF
-  170             CONTINUE
-  180          CONTINUE
-            ELSE
-               DO 220, J = 1, N
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( J, J )
-                  DO 190, I = 1, M
-                     B( I, J ) = TEMP*B( I, J )
-  190             CONTINUE
-                  DO 210, K = J + 1, N
-                     IF( A( K, J ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( K, J )
-                        DO 200, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  200                   CONTINUE
-                     END IF
-  210             CONTINUE
-  220          CONTINUE
-            END IF
-         ELSE
-*
-*           Form  B := alpha*B*A'.
-*
-            IF( UPPER )THEN
-               DO 260, K = 1, N
-                  DO 240, J = 1, K - 1
-                     IF( A( J, K ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( J, K )
-                        DO 230, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  230                   CONTINUE
-                     END IF
-  240             CONTINUE
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( K, K )
-                  IF( TEMP.NE.ONE )THEN
-                     DO 250, I = 1, M
-                        B( I, K ) = TEMP*B( I, K )
-  250                CONTINUE
-                  END IF
-  260          CONTINUE
-            ELSE
-               DO 300, K = N, 1, -1
-                  DO 280, J = K + 1, N
-                     IF( A( J, K ).NE.ZERO )THEN
-                        TEMP = ALPHA*A( J, K )
-                        DO 270, I = 1, M
-                           B( I, J ) = B( I, J ) + TEMP*B( I, K )
-  270                   CONTINUE
-                     END IF
-  280             CONTINUE
-                  TEMP = ALPHA
-                  IF( NOUNIT )
-     $               TEMP = TEMP*A( K, K )
-                  IF( TEMP.NE.ONE )THEN
-                     DO 290, I = 1, M
-                        B( I, K ) = TEMP*B( I, K )
-  290                CONTINUE
-                  END IF
-  300          CONTINUE
-            END IF
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DTRMM .
-*
-      END
-      SUBROUTINE DGEMM ( TRANSA, TRANSB, M, N, K, ALPHA, A, LDA, B, LDB,
-     $                   BETA, C, LDC )
-*     .. Scalar Arguments ..
-      CHARACTER*1        TRANSA, TRANSB
-      INTEGER            M, N, K, LDA, LDB, LDC
-      DOUBLE PRECISION   ALPHA, BETA
-*     .. Array Arguments ..
-      DOUBLE PRECISION   A( LDA, * ), B( LDB, * ), C( LDC, * )
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DGEMM  performs one of the matrix-matrix operations
-*
-*     C := alpha*op( A )*op( B ) + beta*C,
-*
-*  where  op( X ) is one of
-*
-*     op( X ) = X   or   op( X ) = X',
-*
-*  alpha and beta are scalars, and A, B and C are matrices, with op( A )
-*  an m by k matrix,  op( B )  a  k by n matrix and  C an m by n matrix.
-*
-*  Parameters
-*  ==========
-*
-*  TRANSA - CHARACTER*1.
-*           On entry, TRANSA specifies the form of op( A ) to be used in
-*           the matrix multiplication as follows:
-*
-*              TRANSA = 'N' or 'n',  op( A ) = A.
-*
-*              TRANSA = 'T' or 't',  op( A ) = A'.
-*
-*              TRANSA = 'C' or 'c',  op( A ) = A'.
-*
-*           Unchanged on exit.
-*
-*  TRANSB - CHARACTER*1.
-*           On entry, TRANSB specifies the form of op( B ) to be used in
-*           the matrix multiplication as follows:
-*
-*              TRANSB = 'N' or 'n',  op( B ) = B.
-*
-*              TRANSB = 'T' or 't',  op( B ) = B'.
-*
-*              TRANSB = 'C' or 'c',  op( B ) = B'.
-*
-*           Unchanged on exit.
-*
-*  M      - INTEGER.
-*           On entry,  M  specifies  the number  of rows  of the  matrix
-*           op( A )  and of the  matrix  C.  M  must  be at least  zero.
-*           Unchanged on exit.
-*
-*  N      - INTEGER.
-*           On entry,  N  specifies the number  of columns of the matrix
-*           op( B ) and the number of columns of the matrix C. N must be
-*           at least zero.
-*           Unchanged on exit.
-*
-*  K      - INTEGER.
-*           On entry,  K  specifies  the number of columns of the matrix
-*           op( A ) and the number of rows of the matrix op( B ). K must
-*           be at least  zero.
-*           Unchanged on exit.
-*
-*  ALPHA  - DOUBLE PRECISION.
-*           On entry, ALPHA specifies the scalar alpha.
-*           Unchanged on exit.
-*
-*  A      - DOUBLE PRECISION array of DIMENSION ( LDA, ka ), where ka is
-*           k  when  TRANSA = 'N' or 'n',  and is  m  otherwise.
-*           Before entry with  TRANSA = 'N' or 'n',  the leading  m by k
-*           part of the array  A  must contain the matrix  A,  otherwise
-*           the leading  k by m  part of the array  A  must contain  the
-*           matrix A.
-*           Unchanged on exit.
-*
-*  LDA    - INTEGER.
-*           On entry, LDA specifies the first dimension of A as declared
-*           in the calling (sub) program. When  TRANSA = 'N' or 'n' then
-*           LDA must be at least  max( 1, m ), otherwise  LDA must be at
-*           least  max( 1, k ).
-*           Unchanged on exit.
-*
-*  B      - DOUBLE PRECISION array of DIMENSION ( LDB, kb ), where kb is
-*           n  when  TRANSB = 'N' or 'n',  and is  k  otherwise.
-*           Before entry with  TRANSB = 'N' or 'n',  the leading  k by n
-*           part of the array  B  must contain the matrix  B,  otherwise
-*           the leading  n by k  part of the array  B  must contain  the
-*           matrix B.
-*           Unchanged on exit.
-*
-*  LDB    - INTEGER.
-*           On entry, LDB specifies the first dimension of B as declared
-*           in the calling (sub) program. When  TRANSB = 'N' or 'n' then
-*           LDB must be at least  max( 1, k ), otherwise  LDB must be at
-*           least  max( 1, n ).
-*           Unchanged on exit.
-*
-*  BETA   - DOUBLE PRECISION.
-*           On entry,  BETA  specifies the scalar  beta.  When  BETA  is
-*           supplied as zero then C need not be set on input.
-*           Unchanged on exit.
-*
-*  C      - DOUBLE PRECISION array of DIMENSION ( LDC, n ).
-*           Before entry, the leading  m by n  part of the array  C must
-*           contain the matrix  C,  except when  beta  is zero, in which
-*           case C need not be set on entry.
-*           On exit, the array  C  is overwritten by the  m by n  matrix
-*           ( alpha*op( A )*op( B ) + beta*C ).
-*
-*  LDC    - INTEGER.
-*           On entry, LDC specifies the first dimension of C as declared
-*           in  the  calling  (sub)  program.   LDC  must  be  at  least
-*           max( 1, m ).
-*           Unchanged on exit.
-*
-*
-*  Level 3 Blas routine.
-*
-*  -- Written on 8-February-1989.
-*     Jack Dongarra, Argonne National Laboratory.
-*     Iain Duff, AERE Harwell.
-*     Jeremy Du Croz, Numerical Algorithms Group Ltd.
-*     Sven Hammarling, Numerical Algorithms Group Ltd.
-*
-*
-*     .. External Functions ..
-      LOGICAL            LSAME
-      EXTERNAL           LSAME
-*     .. External Subroutines ..
-      EXTERNAL           XERBLA
-*     .. Intrinsic Functions ..
-      INTRINSIC          MAX
-*     .. Local Scalars ..
-      LOGICAL            NOTA, NOTB
-      INTEGER            I, INFO, J, L, NCOLA, NROWA, NROWB
-      DOUBLE PRECISION   TEMP
-*     .. Parameters ..
-      DOUBLE PRECISION   ONE         , ZERO
-      PARAMETER        ( ONE = 1.0D+0, ZERO = 0.0D+0 )
-*     ..
-*     .. Executable Statements ..
-*
-*     Set  NOTA  and  NOTB  as  true if  A  and  B  respectively are not
-*     transposed and set  NROWA, NCOLA and  NROWB  as the number of rows
-*     and  columns of  A  and the  number of  rows  of  B  respectively.
-*
-      NOTA  = LSAME( TRANSA, 'N' )
-      NOTB  = LSAME( TRANSB, 'N' )
-      IF( NOTA )THEN
-         NROWA = M
-         NCOLA = K
-      ELSE
-         NROWA = K
-         NCOLA = M
-      END IF
-      IF( NOTB )THEN
-         NROWB = K
-      ELSE
-         NROWB = N
-      END IF
-*
-*     Test the input parameters.
-*
-      INFO = 0
-      IF(      ( .NOT.NOTA                 ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'C' ) ).AND.
-     $         ( .NOT.LSAME( TRANSA, 'T' ) )      )THEN
-         INFO = 1
-      ELSE IF( ( .NOT.NOTB                 ).AND.
-     $         ( .NOT.LSAME( TRANSB, 'C' ) ).AND.
-     $         ( .NOT.LSAME( TRANSB, 'T' ) )      )THEN
-         INFO = 2
-      ELSE IF( M  .LT.0               )THEN
-         INFO = 3
-      ELSE IF( N  .LT.0               )THEN
-         INFO = 4
-      ELSE IF( K  .LT.0               )THEN
-         INFO = 5
-      ELSE IF( LDA.LT.MAX( 1, NROWA ) )THEN
-         INFO = 8
-      ELSE IF( LDB.LT.MAX( 1, NROWB ) )THEN
-         INFO = 10
-      ELSE IF( LDC.LT.MAX( 1, M     ) )THEN
-         INFO = 13
-      END IF
-      IF( INFO.NE.0 )THEN
-         CALL XERBLA( 'DGEMM ', INFO )
-         RETURN
-      END IF
-*
-*     Quick return if possible.
-*
-      IF( ( M.EQ.0 ).OR.( N.EQ.0 ).OR.
-     $    ( ( ( ALPHA.EQ.ZERO ).OR.( K.EQ.0 ) ).AND.( BETA.EQ.ONE ) ) )
-     $   RETURN
-*
-*     And if  alpha.eq.zero.
-*
-      IF( ALPHA.EQ.ZERO )THEN
-         IF( BETA.EQ.ZERO )THEN
-            DO 20, J = 1, N
-               DO 10, I = 1, M
-                  C( I, J ) = ZERO
-   10          CONTINUE
-   20       CONTINUE
-         ELSE
-            DO 40, J = 1, N
-               DO 30, I = 1, M
-                  C( I, J ) = BETA*C( I, J )
-   30          CONTINUE
-   40       CONTINUE
-         END IF
-         RETURN
-      END IF
-*
-*     Start the operations.
-*
-      IF( NOTB )THEN
-         IF( NOTA )THEN
-*
-*           Form  C := alpha*A*B + beta*C.
-*
-            DO 90, J = 1, N
-               IF( BETA.EQ.ZERO )THEN
-                  DO 50, I = 1, M
-                     C( I, J ) = ZERO
-   50             CONTINUE
-               ELSE IF( BETA.NE.ONE )THEN
-                  DO 60, I = 1, M
-                     C( I, J ) = BETA*C( I, J )
-   60             CONTINUE
-               END IF
-               DO 80, L = 1, K
-                  IF( B( L, J ).NE.ZERO )THEN
-                     TEMP = ALPHA*B( L, J )
-                     DO 70, I = 1, M
-                        C( I, J ) = C( I, J ) + TEMP*A( I, L )
-   70                CONTINUE
-                  END IF
-   80          CONTINUE
-   90       CONTINUE
-         ELSE
-*
-*           Form  C := alpha*A'*B + beta*C
-*
-            DO 120, J = 1, N
-               DO 110, I = 1, M
-                  TEMP = ZERO
-                  DO 100, L = 1, K
-                     TEMP = TEMP + A( L, I )*B( L, J )
-  100             CONTINUE
-                  IF( BETA.EQ.ZERO )THEN
-                     C( I, J ) = ALPHA*TEMP
-                  ELSE
-                     C( I, J ) = ALPHA*TEMP + BETA*C( I, J )
-                  END IF
-  110          CONTINUE
-  120       CONTINUE
-         END IF
-      ELSE
-         IF( NOTA )THEN
-*
-*           Form  C := alpha*A*B' + beta*C
-*
-            DO 170, J = 1, N
-               IF( BETA.EQ.ZERO )THEN
-                  DO 130, I = 1, M
-                     C( I, J ) = ZERO
-  130             CONTINUE
-               ELSE IF( BETA.NE.ONE )THEN
-                  DO 140, I = 1, M
-                     C( I, J ) = BETA*C( I, J )
-  140             CONTINUE
-               END IF
-               DO 160, L = 1, K
-                  IF( B( J, L ).NE.ZERO )THEN
-                     TEMP = ALPHA*B( J, L )
-                     DO 150, I = 1, M
-                        C( I, J ) = C( I, J ) + TEMP*A( I, L )
-  150                CONTINUE
-                  END IF
-  160          CONTINUE
-  170       CONTINUE
-         ELSE
-*
-*           Form  C := alpha*A'*B' + beta*C
-*
-            DO 200, J = 1, N
-               DO 190, I = 1, M
-                  TEMP = ZERO
-                  DO 180, L = 1, K
-                     TEMP = TEMP + A( L, I )*B( J, L )
-  180             CONTINUE
-                  IF( BETA.EQ.ZERO )THEN
-                     C( I, J ) = ALPHA*TEMP
-                  ELSE
-                     C( I, J ) = ALPHA*TEMP + BETA*C( I, J )
-                  END IF
-  190          CONTINUE
-  200       CONTINUE
-         END IF
-      END IF
-*
-      RETURN
-*
-*     End of DGEMM .
-*
-      END
-      subroutine  dcopy(n,dx,incx,dy,incy)
-c
-c     copies a vector, x, to a vector, y.
-c     uses unrolled loops for increments equal to one.
-c     jack dongarra, linpack, 3/11/78.
-c
-      double precision dx(1),dy(1)
-      integer i,incx,incy,ix,iy,m,mp1,n
-c
-      if(n.le.0)return
-      if(incx.eq.1.and.incy.eq.1)go to 20
-c
-c        code for unequal increments or equal increments
-c          not equal to 1
-c
-      ix = 1
-      iy = 1
-      if(incx.lt.0)ix = (-n+1)*incx + 1
-      if(incy.lt.0)iy = (-n+1)*incy + 1
-      do 10 i = 1,n
-        dy(iy) = dx(ix)
-        ix = ix + incx
-        iy = iy + incy
-   10 continue
-      return
-c
-c        code for both increments equal to 1
-c
-c
-c        clean-up loop
-c
-   20 m = mod(n,7)
-      if( m .eq. 0 ) go to 40
-      do 30 i = 1,m
-        dy(i) = dx(i)
-   30 continue
-      if( n .lt. 7 ) return
-   40 mp1 = m + 1
-      do 50 i = mp1,n,7
-        dy(i) = dx(i)
-        dy(i + 1) = dx(i + 1)
-        dy(i + 2) = dx(i + 2)
-        dy(i + 3) = dx(i + 3)
-        dy(i + 4) = dx(i + 4)
-        dy(i + 5) = dx(i + 5)
-        dy(i + 6) = dx(i + 6)
-   50 continue
-      return
-      end
-      SUBROUTINE DLADIV( A, B, C, D, P, Q )
-*
-*  -- LAPACK auxiliary routine (version 1.1) --
-*     Univ. of Tennessee, Univ. of California Berkeley, NAG Ltd.,
-*     Courant Institute, Argonne National Lab, and Rice University
-*     October 31, 1992
-*
-*     .. Scalar Arguments ..
-      DOUBLE PRECISION   A, B, C, D, P, Q
-*     ..
-*
-*  Purpose
-*  =======
-*
-*  DLADIV performs complex division in  real arithmetic
-*
-*                        a + i*b
-*             p + i*q = ---------
-*                        c + i*d
-*
-*  The algorithm is due to Robert L. Smith and can be found
-*  in D. Knuth, The art of Computer Programming, Vol.2, p.195
-*
-*  Arguments
-*  =========
-*
-*  A       (input) DOUBLE PRECISION
-*  B       (input) DOUBLE PRECISION
-*  C       (input) DOUBLE PRECISION
-*  D       (input) DOUBLE PRECISION
-*          The scalars a, b, c, and d in the above expression.
-*
-*  P       (output) DOUBLE PRECISION
-*  Q       (output) DOUBLE PRECISION
-*          The scalars p and q in the above expression.
-*
-*  =====================================================================
-*
-*     .. Local Scalars ..
-      DOUBLE PRECISION   E, F
-*     ..
-*     .. Intrinsic Functions ..
-      INTRINSIC          ABS
-*     ..
-*     .. Executable Statements ..
-*
-      IF( ABS( D ).LT.ABS( C ) ) THEN
-         E = D / C
-         F = C + D*E
-         P = ( A+B*E ) / F
-         Q = ( B-A*E ) / F
-      ELSE
-         E = C / D
-         F = D + C*E
-         P = ( B+A*E ) / F
-         Q = ( -A+B*E ) / F
-      END IF
-*
-      RETURN
-*
-*     End of DLADIV
-*
-      END
diff --git a/sandbox/857/main_template.f90 b/sandbox/857/main_template.f90
deleted file mode 100644
index 7dd5005..0000000
--- a/sandbox/857/main_template.f90
+++ /dev/null
@@ -1,436 +0,0 @@
-!*****************************************************************************
-! Authors: HaiJun Su, J. Michael McCarthy, Masha Sosonkina, Layne T. Watson.
-!
-! Date:    August, 2004. 
-!*****************************************************************************
-! This file contains a sample main program and user written subroutine
-! for the POLSYS_GLP package. 
-!
-! This is a modified version of MAIN_TEMPLATE for POLSYS_PLP adapted
-! for parallel computation using MPI and general linear product set
-! structures.
-
-PROGRAM MAIN_TEMPLATE
-!
-! MAIN_TEMPLATE is a template for calling BEZOUT_GLP and POLSYS_GLP.
-! There are two options provided by MAIN_TEMPLATE:  (1) MAIN_TEMPLATE
-! returns only the generalized GLP Bezout number ("root count") of the
-! target polynomial system based on a system partition provided by the
-! user (calls BEZOUT_GLP) or (2) MAIN_TEMPLATE returns the root count,
-! homotopy path tracking statistics, error flags, and the roots (calls
-! POLSYS_GLP).  For the first option set the SYSGLPSET logical switch
-! ROOT_COUNT_ONLY = .TRUE., and for the second option set ROOT_COUNT_ONLY
-! = .FALSE..
-! 
-! The input file contains data that defines the target system, system
-! covering (set structure), and set degrees of the start system.
-!
-! This main program illustrates how to find the root count and solve a 
-! polynomial system.  The data is read in using NAMELISTs, which makes the 
-! input data file self-explanatory.  The problem definition is given in
-! the NAMELIST /PROBLEM/ and the GLP system set structure is defined in the
-! NAMELIST /SYSGLPSET/.  A new polynomial system definition is
-! signalled by setting the variable NEW_PROBLEM=.TRUE. in the /PROBLEM/
-! namelist.  Thus, a data file describing a polynomial system to
-! solve might look like:
-! 
-! &PROBLEM NEW_PROBLEM=.TRUE.  data  /
-! &SYSGLPSET ROOT_COUNT_ONLY=.TRUE.  data  /  count roots
-! 
-! &PROBLEM NEW_PROBLEM=.TRUE.  data  /
-! &SYSGLPSET ROOT_COUNT_ONLY=.FALSE.  data  /  find roots
-! 
-! Note that static arrays are used below only to support NAMELIST input;
-! the actual storage of the polynomial system and covering information
-! in the data structures in the module GLOBAL_GLP is very compact.
-!
-! INCLUDE 'mpif.h' ! Exists in POLSYS2.
-
-USE POLSYS2
-IMPLICIT NONE
-
-! Local variables.
-INTEGER, PARAMETER:: MMAXT = 500, NN = 20
-INTEGER:: BGLP, I, IFLAG1, J, K, M, MAXT, N, NUMRR = 1
-INTEGER:: NUM_REAL, NUM_FAILED, NUM_SOL
-INTEGER, DIMENSION(NN):: NUM_SETS, NUM_TERMS
-INTEGER, DIMENSION(NN,NN):: NUM_INDICES, SET_DEG
-INTEGER, DIMENSION(NN,NN,NN):: INDEX
-INTEGER, DIMENSION(NN,MMAXT,NN):: DEG
-INTEGER, DIMENSION(:), POINTER:: IFLAG2, INDEX_PATH_TRACKED, NFE
-REAL (KIND=R8):: FINALTOL, SINGTOL, TRACKTOL
-REAL (KIND=R8), DIMENSION(8):: SSPAR
-REAL (KIND=R8), DIMENSION(NN):: SCALE_FACTORS
-REAL (KIND=R8), DIMENSION(:), POINTER:: ARCLEN, LAMBDA
-COMPLEX (KIND=R8), DIMENSION(NN,MMAXT):: COEF
-COMPLEX (KIND=R8), DIMENSION(:,:), POINTER:: ROOTS
-CHARACTER (LEN=80):: TITLE
-CHARACTER (LEN=80), DIMENSION(NN):: DG, P
-CHARACTER (LEN=80):: INPUT_FILE_NAME, OUTPUT_FILE_NAME
-
-LOGICAL:: NEW_PROBLEM, NO_SCALING, RECALL, ROOT_COUNT_ONLY, USER_F_DF
-
-! MPI variables.
-INTEGER, PARAMETER:: MASTER_PROC = 0 !Process 0 is the master process.
-INTEGER:: IERR, RC
-INTEGER:: NUM_PROC  ! The number of processes.
-INTEGER:: RANK_PROC ! The process RANK_PROC.
-
-INTEGER, DIMENSION(:), POINTER:: PATH_COUNT,PATH_COUNT_DISP
-REAL (KIND=R8):: END_TIME, START_TIME
-REAL (KIND=R8), DIMENSION(:), POINTER:: RUN_TIME
-
-
-NAMELIST /PROBLEM/ COEF,DEG,FINALTOL,N,NEW_PROBLEM,NUMRR,NUM_TERMS,&
-                   TITLE,TRACKTOL,SINGTOL,SSPAR 
-NAMELIST /SYSGLPSET/ DG,INDEX,NUM_INDICES,NUM_SETS,P,ROOT_COUNT_ONLY,SET_DEG
-
-!Disassociate pointers.
-NULLIFY(IFLAG2, NFE, ARCLEN, LAMBDA, ROOTS, INDEX_PATH_TRACKED) 
-
-! Initialize MPI.                               
-CALL MPI_INIT(IERR)
-
-IF (IERR .NE. 0) THEN
- WRITE (*,*) 'Error starting MPI program. Terminating.'
- CALL MPI_ABORT(MPI_COMM_WORLD, RC, IERR)
- STOP
-END IF
-
-! Get my process number, RANK_PROC.
-CALL MPI_COMM_RANK(MPI_COMM_WORLD, RANK_PROC, IERR)
-! Get total number of processes used.
-CALL MPI_COMM_SIZE(MPI_COMM_WORLD, NUM_PROC, IERR)
-
-! MAIN_TEMPLATE reads the target polynomial system definition and the
-! system covering (set structure) specification from the file INPUT.DAT.
-INPUT_FILE_NAME = 'INPUT.DAT'
-OUTPUT_FILE_NAME = 'OUTPUT.DAT'
-
-IF (RANK_PROC .EQ. MASTER_PROC) THEN
-  WRITE (*,*) 'Total of ', NUM_PROC, ' processes have been initialized.'
-  WRITE (*,*) 'Processors are reading POLSYS_GLP data from "', &
-    TRIM(INPUT_FILE_NAME), '".'
-END IF
-
-ALLOCATE(PATH_COUNT(NUM_PROC))
-ALLOCATE(PATH_COUNT_DISP(NUM_PROC))
-ALLOCATE(RUN_TIME(NUM_PROC))
-
-SSPAR(1:8) = 0.0_R8 ; DEG = 0 ; COEF = (0.0_R8,0.0_R8)
-
-IF (RANK_PROC .EQ. MASTER_PROC) THEN
-  OPEN (UNIT=7,FILE=OUTPUT_FILE_NAME,ACTION='WRITE',STATUS='REPLACE',& 
-      DELIM='NONE')
-END IF
-OPEN (UNIT=3,FILE=INPUT_FILE_NAME,ACTION='READ',POSITION='REWIND',   &
-      DELIM='APOSTROPHE',STATUS='OLD')
-
-
-MAIN_LOOP: DO
-
-! Zero out  various counters.
-NUM_SOL = 0      ! Number of finite solutions.
-NUM_REAL = 0     ! Number of finite real solutions.
-NUM_FAILED = 0   ! Number of homotopy path tracking failures.
-
-READ (3,NML=PROBLEM,END=1000)
-
-! Allocate storage for the target system in POLYNOMIAL.
-IF (NEW_PROBLEM) THEN
-  CALL CLEANUP_POL
-  ALLOCATE(POLYNOMIAL(N))
-  DO I=1,N
-    POLYNOMIAL(I)%NUM_TERMS = NUM_TERMS(I)
-    ALLOCATE(POLYNOMIAL(I)%TERM(NUM_TERMS(I)))
-    DO J=1,NUM_TERMS(I)
-      ALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG(N+1))
-      POLYNOMIAL(I)%TERM(J)%COEF = COEF(I,J) 
-      POLYNOMIAL(I)%TERM(J)%DEG(1:N) = DEG(I,J,1:N)
-    END DO
-  END DO
-END IF
-
-READ (3,NML=SYSGLPSET)
-
-! Allocate storage for the system set structure in COVER. 
-CALL CLEANUP_PAR
-ALLOCATE(COVER_SIZES(N))
-COVER_SIZES(1:N) = NUM_SETS(1:N)
-ALLOCATE(COVER(N))
-DO I=1,N
-  ALLOCATE(COVER(I)%SET(COVER_SIZES(I)))
-  DO J=1,COVER_SIZES(I)
-    COVER(I)%SET(J)%NUM_INDICES = NUM_INDICES(I,J)
-    COVER(I)%SET(J)%SET_DEG = SET_DEG(I,J)
-    ALLOCATE(COVER(I)%SET(J)%INDEX(NUM_INDICES(I,J)))
-    COVER(I)%SET(J)%INDEX(1:NUM_INDICES(I,J)) = &
-                    INDEX(I,J,1:NUM_INDICES(I,J))
-  END DO 
-END DO
-
-IF (ROOT_COUNT_ONLY) THEN
-  ! Have the master compute GLP Bezout number.
-  IF (RANK_PROC .EQ. MASTER_PROC) THEN
-    MAXT = MAXVAL(NUM_TERMS(1:N))
-    CALL BEZOUT_GLP(N,MAXT,SINGTOL,BGLP)
-  END IF
-ELSE
-  ! Compute all BGLP roots of the target polynomial system.
-  IF (RANK_PROC .EQ. MASTER_PROC) THEN
-    WRITE (*,*) 'Path tracking started.'
-  END IF
-  START_TIME = MPI_WTIME()
-
-  ! Compute roots of the target polynomial system.
-  CALL POLSYS_GLP(INDEX_PATH_TRACKED, PATH_COUNT(RANK_PROC+1),N,&
-     TRACKTOL,FINALTOL,SINGTOL,SSPAR,BGLP,IFLAG1,IFLAG2,&
-     ARCLEN,LAMBDA,ROOTS,NFE,SCALE_FACTORS,NUMRR=NUMRR)
-
-  END_TIME = MPI_WTIME()
-  RUN_TIME(RANK_PROC+1) = END_TIME - START_TIME
-  IF (RANK_PROC .EQ. MASTER_PROC) THEN
-    WRITE (*,*) 'Path tracking finished.'
-  END IF 
-  IF (IFLAG1 .NE. 0) THEN
-    IF (RANK_PROC .EQ. MASTER_PROC) THEN
-      WRITE (*,*) 'Program aborted with error flag IFLAG1 =', IFLAG1,'.'
-    END IF
-    GOTO 1000
-  END IF
-
-  ! Gather PATH_COUNT and timings from slave processes to the master. 
-  CALL MPI_GATHER(PATH_COUNT(RANK_PROC+1),1,MPI_INTEGER,PATH_COUNT, &
-       1,MPI_INTEGER,MASTER_PROC,MPI_COMM_WORLD,IERR)
-
-  CALL MPI_GATHER(RUN_TIME(RANK_PROC+1),1,MPI_DOUBLE_PRECISION,RUN_TIME, &
-       1,MPI_DOUBLE_PRECISION,MASTER_PROC,MPI_COMM_WORLD,IERR)
-
-  IF (RANK_PROC .EQ. MASTER_PROC) THEN
-    PATH_COUNT_DISP(1) = 0
-    DO I=2,NUM_PROC
-      PATH_COUNT_DISP(I) = PATH_COUNT_DISP(I-1) + PATH_COUNT(I-1)
-    END DO
-  END IF
-
-! Gather solution information from slave processes to the master.
-  CALL MPI_GATHERV(INDEX_PATH_TRACKED, PATH_COUNT(RANK_PROC+1), MPI_INTEGER,&
-     INDEX_PATH_TRACKED, PATH_COUNT, PATH_COUNT_DISP, MPI_INTEGER, &
-     MASTER_PROC, MPI_COMM_WORLD,IERR)
-
-  CALL MPI_GATHERV(ARCLEN, PATH_COUNT(RANK_PROC+1), MPI_DOUBLE_PRECISION, &
-     ARCLEN, PATH_COUNT, PATH_COUNT_DISP, MPI_DOUBLE_PRECISION, &
-     MASTER_PROC, MPI_COMM_WORLD,IERR)
-
-  CALL MPI_GATHERV(NFE,PATH_COUNT(RANK_PROC+1),MPI_INTEGER,NFE,PATH_COUNT,&
-     PATH_COUNT_DISP,MPI_INTEGER,MASTER_PROC,MPI_COMM_WORLD,IERR)
-
-  CALL MPI_GATHERV(IFLAG2,PATH_COUNT(RANK_PROC+1),MPI_INTEGER,IFLAG2,&
-     PATH_COUNT,PATH_COUNT_DISP,MPI_INTEGER,MASTER_PROC,MPI_COMM_WORLD,IERR)
-
-  CALL MPI_GATHERV(LAMBDA, PATH_COUNT(RANK_PROC+1),MPI_DOUBLE_PRECISION, &
-     LAMBDA,PATH_COUNT,PATH_COUNT_DISP,MPI_DOUBLE_PRECISION, MASTER_PROC, &
-     MPI_COMM_WORLD, IERR)
-
-! Gather roots, each of size N padded with one homogeneous
-! variable, from slave processes.
-  CALL MPI_GATHERV(ROOTS(1:N+1, 1:PATH_COUNT(RANK_PROC+1)), &
-     (N+1)*PATH_COUNT(RANK_PROC+1),MPI_DOUBLE_COMPLEX,&
-     ROOTS,(N+1)*PATH_COUNT,(N+1)*PATH_COUNT_DISP,MPI_DOUBLE_COMPLEX, &
-     MASTER_PROC, MPI_COMM_WORLD,IERR)
-END IF
-
-! Master process controls solutions' output.
-IF (RANK_PROC .EQ. MASTER_PROC) THEN
-  IF (NEW_PROBLEM) THEN
-    WRITE (7,190) TITLE,TRACKTOL,FINALTOL,SINGTOL,SSPAR(5),N
-    190 FORMAT(///A80//'TRACKTOL, FINALTOL =',2ES22.14, &
-      /,'SINGTOL (0 SETS DEFAULT) =',ES22.14, &
-      /,'SSPAR(5) (0 SETS DEFAULT) =',ES22.14, &
-      /,'NUMBER OF EQUATIONS =',I3)
-  END IF
-  IF (.NOT. ROOT_COUNT_ONLY) THEN
-    WRITE (*,*) 'Master process is writing solutions to "',  &
-      TRIM(OUTPUT_FILE_NAME), '".'
-    M = 1
-    DO I=1,NUM_PROC
-      WRITE (7,500) I,PATH_COUNT(I), RUN_TIME(I)
-      500 FORMAT(/'===== PROCESSOR ', I4,' TRACKED ', I6, &
-                  ' PATHS IN ', ES12.3, ' secs =====')
-      DO K=1,PATH_COUNT(I)
-        WRITE (7,600) INDEX_PATH_TRACKED(M),ARCLEN(M),NFE(M),IFLAG2(M)
-        600 FORMAT(/'PATH NUMBER =',I10//'ARCLEN =',ES22.14/'NFE =',I5/ &
-                   'IFLAG2 =',I3)
-        ! Designate solutions as "FAILED" or "NORMAL."
-        IF (MOD(IFLAG2(M),10) == 1) THEN
-          ! Normal error return.
-          WRITE (7,610) 1.0_R8,LAMBDA(M)
-          610 FORMAT('LAMBDA =',ES22.14,', ESTIMATED ERROR =',ES22.14)
-          ! Designate solutions as "FINITE" or "INFINITE."
-          IF (ABS(ROOTS(N+1,M)) < 1.0E-6_R8) THEN
-            WRITE (7,620) 
-            620 FORMAT('SOLUTION AT INFINITY'/)
-          ELSE
-            NUM_SOL = NUM_SOL + 1
-            ! Designate solutions as "REAL" or "COMPLEX."
-            IF (ANY(ABS(AIMAG(ROOTS(1:N,M))) >= 1.0E-4_R8)) THEN
-              WRITE (7,630)
-              630 FORMAT('FINITE COMPLEX SOLUTION'/)
-            ELSE
-              NUM_REAL = NUM_REAL + 1
-              WRITE (7,640)
-              640 FORMAT('FINITE REAL SOLUTION'/)
-            END IF
-          END IF
-        ELSE
-          NUM_FAILED = NUM_FAILED + 1 ! Homotopy path tracking failed.
-          WRITE (7,650) LAMBDA(M)
-          650 FORMAT('LAMBDA =',ES22.14/)
-        END IF
-
-        WRITE (7,660) (J,ROOTS(J,M),J=1,N)
-        660 FORMAT(('X(',I2,') = (',ES22.14,',',ES22.14,')'))
-        WRITE (7,670) N + 1, ROOTS(N+1,M)
-        670 FORMAT(/,'X(',I2,') = (',ES22.14,',',ES22.14,')')
-
-        M = M + 1
-      END DO
-    END DO
-
-    WRITE (7,910) NUM_PROC, BGLP, NUM_SOL, NUM_REAL, NUM_SOL-NUM_REAL, &
-          BGLP-NUM_SOL-NUM_FAILED, NUM_FAILED, MAXVAL(RUN_TIME)
-    910 FORMAT(  &
-          /'=========Number of processors used: ',I6,'  ========', &
-          /'Bezout GLP number (BGLP)          : ',I6 &
-          /'Number of finite solutions        : ',I6 &
-          /'Number of finite real solutions   : ',I6 &
-          /'Number of finite complex solutions: ',I6 &
-          /'Number of solutions at infinity   : ',I6 &
-          /'Number of homotopy path failures  : ',I6 &
-          /'Maximum running time              : ',ES11.3,' secs',/52('='))
-   ELSE  ! ROOT_COUNT_ONLY=.TRUE.
-     WRITE (7,1010) BGLP,(J,TRIM(P(J)),J,TRIM(DG(J)),J=1,N)
-     1010 FORMAT(/60('='),/ &
-            'Bezout GLP number (BGLP) =',I8,' for the system covering:', &
-            /('P(',I2,') = ',A,',   DG(',I2,') = ',A))
-     WRITE (7,FMT="(60('='))")
-   END IF
-END IF
-CALL MPI_BARRIER(MPI_COMM_WORLD, IERR)
-
-END DO MAIN_LOOP
-
-DEALLOCATE(PATH_COUNT)
-DEALLOCATE(PATH_COUNT_DISP)
-DEALLOCATE(RUN_TIME)
-
-1000 IF (RANK_PROC .EQ. MASTER_PROC) CLOSE (UNIT=7)  
-CLOSE (UNIT=3)  
-CALL CLEANUP_POL
-CALL CLEANUP_PAR
-
-! Shut down MPI.
-CALL MPI_FINALIZE(IERR)
-
-STOP
-
-CONTAINS
-
-SUBROUTINE CLEANUP_POL
-
-! Deallocates structure POLYNOMIAL.
-
-IF (.NOT. ALLOCATED(POLYNOMIAL)) RETURN
-DO I=1,SIZE(POLYNOMIAL)
-  DO J=1,NUMT(I)
-    DEALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG)
-  END DO
-  DEALLOCATE(POLYNOMIAL(I)%TERM)
-END DO
-DEALLOCATE(POLYNOMIAL)
-RETURN
-END SUBROUTINE CLEANUP_POL
-
-SUBROUTINE CLEANUP_PAR
-
-! Deallocates structure COVER.
-
-IF (.NOT. ALLOCATED(COVER)) RETURN
-DO I=1,SIZE(COVER)
-  DO J=1,COVER_SIZES(I)
-    DEALLOCATE(COVER(I)%SET(J)%INDEX)
-  END DO
-  DEALLOCATE(COVER(I)%SET)
-END DO
-DEALLOCATE(COVER)
-DEALLOCATE(COVER_SIZES)  
-RETURN
-END SUBROUTINE CLEANUP_PAR
-
-END PROGRAM MAIN_TEMPLATE
-
-SUBROUTINE TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF)
-! Template for user written subroutine to evaluate the (complex) target
-! system F(XC) and its (complex) N x N Jacobian matrix DF(XC).  XC(1:N+1)
-! is in complex projective coordinates, and the homogeneous coordinate
-! XC(N+1) is explicitly eliminated from F(XC) and DF(XC) using the
-! projective transformation (cf. the comments in START_POINTS_GLP).  The
-! comments in the internal subroutine TARGET_SYSTEM should be read before
-! attempting to write this subroutine; pay particular attention to the
-! handling of the homogeneous coordinate XC(N+1).  DF(:,N+1) is not
-! referenced by the calling program.
-
-USE REAL_PRECISION
-USE GLOBAL_GLP
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-COMPLEX (KIND=R8), INTENT(IN), DIMENSION(N+1):: PROJ_COEF,XC
-COMPLEX (KIND=R8), INTENT(OUT):: F(N), DF(N,N+1)
-
-! For greater efficiency, replace the following code (which is just the
-! internal POLSYS_GLP subroutine TARGET_SYSTEM) with hand-crafted code.
-
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-INTEGER:: DEGREE, I, J, K, L
-COMPLEX (KIND=R8):: T, TS
-DO I=1,N
-  TS = (0.0_R8, 0.0_R8)
-  DO J=1,POLYNOMIAL(I)%NUM_TERMS
-    T = POLYNOMIAL(I)%TERM(J)%COEF
-    DO K=1,N+1
-      DEGREE = POLYNOMIAL(I)%TERM(J)%DEG(K)
-      IF (DEGREE == 0) CYCLE
-      T = T * XC(K)**DEGREE
-    END DO
-    TS = TS + T
-  END DO
-  F(I) = TS
-END DO 
-
-DF = (0.0_R8,0.0_R8)
-
-DO I=1,N
-  DO J=1,N+1
-    TS = (0.0_R8,0.0_R8)
-    DO K=1,POLYNOMIAL(I)%NUM_TERMS
-      DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(J)
-      IF (DEGREE == 0) CYCLE
-      T = POLYNOMIAL(I)%TERM(K)%COEF * DEGREE * (XC(J)**(DEGREE - 1))
-      DO L=1,N+1
-        DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(L)
-        IF ((L == J) .OR. (DEGREE == 0)) CYCLE
-        T = T * (XC(L)**DEGREE)
-      END DO
-      TS = TS + T
-    END DO
-    DF(I,J) = TS
-  END DO
-END DO
-
-DO I=1,N
-  DF(I,1:N) = DF(I,1:N) + PROJ_COEF(1:N) * DF(I,N+1)
-END DO
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-
-RETURN
-END SUBROUTINE TARGET_SYSTEM_USER
diff --git a/sandbox/857/makefile.in b/sandbox/857/makefile.in
deleted file mode 100644
index 89b2ce5..0000000
--- a/sandbox/857/makefile.in
+++ /dev/null
@@ -1,9 +0,0 @@
-# -----------------------------------------------------------------------------
-# Makefile for IBM XLF compilers. 
-# (Data Star system at San Diego Supercomputer Center)
-# -----------------------------------------------------------------------------
-F90_COMPILER	= mpxlf90
-F77_COMPILER	= mpxlf
-LINKER		= mpxlf90
-F_FLAGS		= -c -gline -O0 -qflag=w:i 
-F90_FLAGS	= -qsuffix=f=f90 -qfree=f90
diff --git a/sandbox/857/makefile.inPGI b/sandbox/857/makefile.inPGI
deleted file mode 100644
index 8b02809..0000000
--- a/sandbox/857/makefile.inPGI
+++ /dev/null
@@ -1,9 +0,0 @@
-# -----------------------------------------------------------------------------
-# Makefile.in for PGI compiler. 
-# -----------------------------------------------------------------------------
-F90_COMPILER	= mpif90
-F77_COMPILER	= pgf77
-LINKER		= mpif90
-F_FLAGS		= -c -O0 -C=all -Mbounds -Minform=warn
-F90_FLAGS	= -Mfreeform
-OBJECTS		= lapack_glp.o polsys_glp.o main_template.o  
diff --git a/sandbox/857/makefile.inXLF b/sandbox/857/makefile.inXLF
deleted file mode 100644
index 940bb18..0000000
--- a/sandbox/857/makefile.inXLF
+++ /dev/null
@@ -1,8 +0,0 @@
-# -----------------------------------------------------------------------------
-# Makefile.in for the IBM XLF compiler. 
-# -----------------------------------------------------------------------------
-F90_COMPILER	= mpxlf90
-F77_COMPILER	= mpxlf
-LINKER		= mpxlf90
-F_FLAGS		= -c -gline -O0 -qflag=w:i 
-F90_FLAGS	= -qsuffix=f=f90 -qfree=f90
diff --git a/sandbox/857/polsys_glp.f90 b/sandbox/857/polsys_glp.f90
deleted file mode 100644
index c4aff7c..0000000
--- a/sandbox/857/polsys_glp.f90
+++ /dev/null
@@ -1,3285 +0,0 @@
-! This file contains all the modules and external subroutines for the
-! parallel version of the package POLSYS_GLP, except for the LAPACK
-! routines used, which are distributed in a separate file.  Layne T.
-! Watson, Steven M. Wise, Andrew J. Sommese, August, 1998.  Cosmetic
-! changes, 10/1999.  Extension from POLSYS_PLP to POLSYS_GLP with
-! MPI-based parallelization by Hai-Jun Su, J. Michael McCarthy, Masha
-! Sosonkina, Layne T. Watson, August, 2004.
-
-      MODULE REAL_PRECISION  ! HOMPACK90 module for 64-bit arithmetic.
-      INTEGER, PARAMETER:: R8=SELECTED_REAL_KIND(13)
-      END MODULE REAL_PRECISION
-
-                                      !!!
-MODULE GLOBAL_GLP
-
-! The module GLOBAL_GLP contains derived data types, arrays, and
-! functions used in POLSYS_GLP and related subroutines.  GLOBAL_GLP uses
-! the HOMPACK90 module REAL_PRECISION for 64-bit arithmetic.
-USE REAL_PRECISION, ONLY: R8
-IMPLICIT NONE
-INTEGER, PARAMETER:: LARGE=SELECTED_INT_KIND(15)
-REAL (KIND=R8), PARAMETER:: PI=3.1415926535897932384626433_R8
-
-! TARGET SYSTEM: Let X be a complex N-dimensional vector.  POLSYS_GLP
-! is used to solve the polynomial system, called the target system,
-! F(X)=0, where F is represented by the following derived data types:
-
-TYPE TERM_TYPE
-   COMPLEX (KIND=R8):: COEF
-   INTEGER, DIMENSION(:), POINTER:: DEG
-END TYPE TERM_TYPE
-TYPE POLYNOMIAL_TYPE
-   TYPE(TERM_TYPE), DIMENSION(:), POINTER:: TERM
-   INTEGER:: NUM_TERMS
-END TYPE POLYNOMIAL_TYPE
-TYPE(POLYNOMIAL_TYPE), DIMENSION(:), ALLOCATABLE:: POLYNOMIAL
-
-! The mathematical representation of the target system F is, for I=1,...,N,
-!
-! F_I(X) = SUM_{J=1}^{POLYNOMIAL(I)%NUM_TERMS}
-!          POLYNOMIAL(I)%TERM(J)%COEF * 
-!          PRODUCT_{K=1}^N  X(K)**POLYNOMIAL(I)%TERM(J)%DEG(K).
-!
-! Any program calling POLSYS_GLP (such as the sample main program
-! MAIN_TEMPLATE) must aquire data and allocate storage for the target
-! system as illustrated below:  
-!
-! ALLOCATE(POLYNOMIAL(N))
-! DO I=1,N
-!   READ (*,*) POLYNOMIAL(I)%NUM_TERMS
-!   ALLOCATE(POLYNOMIAL(I)%TERM(POLYNOMIAL(I)%NUM_TERMS))
-!   DO J=1,POLYNOMIAL(I)%NUM_TERMS
-!     ALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG(N+1))
-!     READ (*,*) POLYNOMIAL(I)%TERM(J)%COEF,POLYNOMIAL(I)%TERM(J)%DEG(1:N)
-!   END DO
-! END DO
-!
-! START SYSTEM/COVER:  In a generalized linear product (GLP)
-! formulation the start system G(X)=0 must have the same set structure 
-! as the target system P(X)=0.  G and P are represented by the derived
-! data types:
-
-INTEGER, DIMENSION(:), ALLOCATABLE:: COVER_SIZES
-TYPE SET_TYPE 
-   INTEGER, DIMENSION(:), POINTER:: INDEX
-   INTEGER:: NUM_INDICES
-   INTEGER:: SET_DEG
-   COMPLEX (KIND=R8), DIMENSION(:), POINTER:: START_COEF
-END TYPE SET_TYPE
-TYPE COVER_TYPE
-   TYPE(SET_TYPE), DIMENSION(:), POINTER:: SET 
-END TYPE COVER_TYPE
-TYPE(COVER_TYPE), DIMENSION(:), ALLOCATABLE:: COVER
-
-! The mathematical representation of the start system G is, for I=1,...,N,
-!
-! G_I(X) = PRODUCT_{J=1}^{COVER_SIZES(I)}
-!          ( L(I,J)**COVER(I)%SET(J)%SET_DEG - 1.0 ),
-!
-! where the linear factors L(I,J) are
-!
-! L(I,J) = SUM_{K=1}^{COVER(I)%SET(J)%NUM_INDICES}
-!   COVER(I)%SET(J)%START_COEF(K) * X(COVER(I)%SET(J)%INDEX(K)).
-!
-! The system covering P=(P(1),...,P(N)) is comprised of the
-! coverings P(I) = {S(I,1),...S(I, COVER_SIZES(I))}, where the sets
-! of variables S(I,J) are defined by
-!
-! S(I,J) = UNION_{K=1}^{COVER(I)%SET(J)%NUM_INDICES}
-!          { X(COVER(I)%SET(J)%INDEX(K)) }.
-!
-! The calling program must acquire data and allocate storage as
-! illustrated below:
-!
-! ALLOCATE(COVER_SIZES(N))
-! READ (*,*) COVER_SIZES(1:N)
-! ALLOCATE(COVER(N))
-! DO I=1,N
-!   ALLOCATE(COVER(I)%SET(COVER_SIZES(I))
-!   DO J=1, COVER_SIZES(I)
-!     READ (*,*) COVER(I)%SET(J)%NUM_INDICES
-!     ALLOCATE(COVER(I)%SET(J)%INDEX(COVER(I)%SET(J)%NUM_INDICES))
-!     READ (*,*) COVER(I)%SET(J)%INDEX
-!   END DO
-! END DO
-!
-! START_COEF is generated randomly by POLSYS_GLP.
-! SET_DEG is provided in the input data file.
-! Subroutine CHECK_GLP is used to check the validity of a given generalized 
-! linear decomposition. 
-
-
-CONTAINS
-
-! INDEXING FUNCTIONS FOR THE TARGET SYSTEM:
-!
-! C(I,J) retrieves the coefficient of the Jth term of the Ith polynomial
-! component of the target system.
-
-COMPLEX (KIND=R8) FUNCTION C(I,J) 
-  IMPLICIT NONE
-  INTEGER:: I,J
-  C = POLYNOMIAL(I)%TERM(J)%COEF
-END FUNCTION C
-
-! D(I,J,K) retrieves the degree of the Kth variable in the Jth term of
-! the Ith polynomial component of the target system.
-
-INTEGER FUNCTION D(I,J,K)
-  IMPLICIT NONE
-  INTEGER:: I,J,K
-  D = POLYNOMIAL(I)%TERM(J)%DEG(K)
-END FUNCTION D
-
-! NUMT(I) retrieves the number of terms in the Ith polynomial component of
-! the target system F(X).
-
-INTEGER FUNCTION NUMT(I)
-  IMPLICIT NONE
-  INTEGER:: I
-  NUMT = POLYNOMIAL(I)%NUM_TERMS 
-END FUNCTION NUMT
-
-! The target system is succinctly specified with the retrieval functions:
-!
-! F_I(X) = SUM_{J=1}^{NUMT(I)} C(I,J) * PRODUCT_{K=1}^N  X(K)**D(I,J,K).
-!
-! INDEXING FUNCTIONS FOR THE START SYSTEM/COVER:
-!
-! PAR(I,J,K) retrieves the index of the Kth variable in the Jth set
-! S(I,J) of the Ith covering P(I).
-
-INTEGER FUNCTION PAR(I,J,K)
-  IMPLICIT NONE
-  INTEGER:: I,J,K
-  PAR = COVER(I)%SET(J)%INDEX(K)
-END FUNCTION PAR
-
-! SC(I,J,K) retrieves the coefficient of the variable with index
-! PAR(I,J,K) in the Jth factor of the Ith component of the start system
-! G(X).
-
-COMPLEX (KIND=R8) FUNCTION SC(I,J,K)
-  IMPLICIT NONE
-  INTEGER:: I,J,K
-  SC = COVER(I)%SET(J)%START_COEF(K)
-END FUNCTION SC
-
-! SD(I,J) retrieves the set degree of the Jth set S(I,J) in the Ith
-! covering P(I).
-
-INTEGER FUNCTION SD(I,J)
-  IMPLICIT NONE
-  INTEGER:: I,J
-  SD = COVER(I)%SET(J)%SET_DEG
-END FUNCTION SD
-
-! NUMV(I,J) retrieves the number of variables in the Jth set S(I,J) of
-! the Ith covering P(I).
-
-INTEGER FUNCTION NUMV(I,J)
-  IMPLICIT NONE
-  INTEGER:: I,J
-  NUMV = COVER(I)%SET(J)%NUM_INDICES
-END FUNCTION NUMV
-
-! Both the start system and the set structure are succinctly specified with
-! retrieval functions: 
-!
-! G_I(X) = PRODUCT_{J=1}^{COVER_SIZES(I)}
-! ( [ SUM_{K=1}^{NUMV(I,J)} SC(I,J,K)*X(PAR(I,J,K)) ]**SD(I,J) - 1.0 ),
-!
-! and P(I) = { S(I,1),...,S(I,COVER_SIZES(I)) }, where
-!
-! S(I,J) = UNION_{K=1}^{NUMV(I,J)} { X(PAR(I,J,K)) }.
-
-END MODULE GLOBAL_GLP
-
-                                                                     !!!
-MODULE POLSYS2
-
-! This module contains the subroutines POLSYS_GLP (finds all or some of
-! the roots of a polynomial system defined in the module GLOBAL_GLP),
-! BEZOUT_GLP (computes the generalized Bezout number), and SINGSYS_GLP
-! (checks the nonsingularity of a generic start point).  Typically a
-! user would only call POLSYS_GLP, and thus include in their main
-! program the statements:
-!   USE GLOBAL_GLP
-!   USE POLSYS2, ONLY: POLSYS_GLP
-! An expert user might want to call BEZOUT_GLP or SINGSYS_GLP
-! separately, and thus these routines are also provided as module
-! procedures.
-
-USE GLOBAL_GLP
-INCLUDE 'mpif.h'
-
-CONTAINS
-                                                                     !!!
-SUBROUTINE POLSYS_GLP(INDEX_PATH_TRACKED,PATH_COUNT,N,TRACKTOL,FINALTOL,&
-           SINGTOL,SSPAR,BGLP,IFLAG1,IFLAG2,ARCLEN,LAMBDA,ROOTS,NFE,&
-           SCALE_FACTORS,NUMRR,RECALL,NO_SCALING,USER_F_DF)
-
-! Using a probability-one globally convergent homotopy method,
-! POLSYS_GLP finds all finite isolated complex solutions to a system
-! F(X) = 0 of N polynomial equations in N unknowns with complex
-! coefficients.  A generalized linear product (GLP) formulation is used
-! for the start system of the homotopy map.
-!
-! POLSYS_GLP uses the module GLOBAL_GLP, which contains the definition
-! of the polynomial system to be solved, and also defines the notation
-! used below.  The user may also find it beneficial at some point to
-! refer to the documentation for STEPNX in the HOMPACK90 package.
-!
-! The representation of F(X) is stored in the module GLOBAL_GLP.  Using
-! the same notation as GLOBAL_GLP, F(X) is defined mathematically by
-!
-! F_I(X)=SUM_{J=1}^{NUMT(I)} C(I,J) * PRODUCT_{K=1}^N X(K)**D(I,J,K),
-!
-! for I=1,...,N.
-! 
-! POLSYS_GLP features target system scaling, a projective
-! transformation so that the homotopy zero curves are tracked in complex
-! projective space, and a generalized linear product (GLP) formulation of
-! the start system.  Scaling may be disabled by the optional argument
-! NO_SCALING.  Whatever the case, the roots of F(X) are always returned
-! unscaled and untransformed.  The GLP set structure, possibly different 
-! for each component F_I(X), is defined in the module GLOBAL_GLP.
-!
-! Scaling is carried out in the internal subroutine SCALE_GLP, and is
-! an independent preprocessing step.  SCALE_GLP modifies the polynomial
-! coefficients and creates and stores unscaling factors SCALE_FACTORS
-! for the variables X(I).  The problem is solved with the scaled
-! coefficients and scaled variables.  The coefficients of the target
-! polynomial system, which are contained in the global structure
-! POLYNOMIAL, remain in modified form on return from POLSYS_GLP.
-!
-! With the projective transformation, the system is essentially recast in
-! homogeneous coordinates, Z(1),...,Z(N+1), and solved in complex
-! projective space.  The resulting solutions are untransformed via
-! X(I) = Z(I)/Z(N+1), I=1,...N, unless this division would cause
-! overflow, in which case Re(X(I)) = Im(X(I)) = HUGE(1.0_R8).
-! On return, for the Jth path, ROOTS(I,J) = X(I) for I=1,...,N, and
-! ROOTS(N+1,J) = Z(N+1), the homogeneous variable.
-!
-! In the GLP scheme the number of paths that must be tracked can be
-! less, and commonly far less, than the "total degree" because of the
-! specialized start system G(X) = 0.  The structure of the start system
-! is determined by the system set structure P.  The representations of both
-! are stored in the module GLOBAL_GLP, and following the comments there,
-! are defined mathematically as follows:
-!
-! The system set structure P=(P(1),...,P(N)) is comprised of the 
-! coverings P(I) = {S(I,1),...S(I, COVER_SIZES(I))}, where the sets
-! of variables S(I,J) are defined by
-!
-! S(I,J) = UNION_{K=1}^{NUMV(I,J)} {X(PAR(I,J,K))}.
-!
-! The degree of each set is provided in the input data file.
-! The only restriction on the system set structure P is that each monomial
-! of the target system must be in the span of the set structure of the start
-! system.  CHECK_GLP returns an error if the start system does not contain a
-! a monomial that is in the target system.
-! 
-! The start system is defined mathematically, for I=1,...,N, by
-! 
-! G_I(X) = PRODUCT_{J=1}^{COVER_SIZES(I)} ( L(I,J)**SD(I,J)-1.0 ),
-!
-! where the linear factors L(I,J) are
-!
-! L(I,J) = SUM{K=1}^{NUMV(I,J)} SC(I,J,K)*X(PAR(I,J,K)).
-!
-! Contained in this module (POLSYS2) is the routine BEZOUT_GLP.  This
-! routine calculates the generalized GLP Bezout number, based on the
-! system set structure P and SET_DEG provided by the user, by counting the 
-! number of solutions to the start system.  The user is encouraged to explore 
-! several system set structures with BEZOUT_GLP before calling POLSYS_GLP.  
-! See the sample calling program MAIN_TEMPLATE and the comments in 
-! BEZOUT_GLP.
-!
-! Internal routines:  INIT_GLP, INTERP, OUTPUT_GLP, RHO, ROOT_OF_UNITY,
-!   ROOT_GLP, SCALE_GLP, START_POINTS_GLP, START_SYSTEM, TANGENT_GLP,
-!   TARGET_SYSTEM. 
-!
-! External routines called:  CHECK_GLP, BEZOUT_GLP, SINGSYS_GLP, STEPNX.
-!
-!
-! On input:
-!
-! N is the dimension of the target polynomial system.
-!
-! TRACKTOL is the local error tolerance allowed the path tracker along
-!   the path.  ABSERR and RELERR (of STEPNX) are set to TRACKTOL.
-!
-! FINALTOL is the accuracy desired for the final solution.  It is used
-!   for both the absolute and relative errors in a mixed error criterion.
-!
-! SINGTOL is the singularity test threshold used by SINGSYS_GLP.  If
-!   SINGTOL <= 0.0 on input, then SINGTOL is reset to a default value.
-!
-! SSPAR(1:8) = (LIDEAL, RIDEAL, DIDEAL, HMIN, HMAX, BMIN, BMAX, P) is a
-!   vector of parameters used for the optimal step size estimation. If
-!   SSPAR(I) <= 0.0 on input, it is reset to a default value by STEPNX. 
-!   See the comments in STEPNX for more information.
-!
-! Optional arguments:
-!
-! NUMRR is the number of multiples of 1000 steps that will be tried before
-!   abandoning a path.  If absent, NUMRR is taken as 1.
-!
-! RECALL is used to retrack certain homotopy paths.  It's use assumes
-!   BGLP contains the Bezout number (which is not recalculated),
-!   SCALE_FACTORS contains the variable unscaling factors, and that
-!   IFLAG2(1:BGLP) exists.  The Ith homotopy path is retracked if
-!   IFLAG2(I) = -2, and skipped otherwise.
-!
-! NO_SCALING indicates that the target polynomial is not to be scaled.
-!   Scaling is done by default when NO_SCALING is absent.
-!
-! USER_F_DF indicates (when present) that the user is providing a subroutine
-!   TARGET_SYSTEM_USER to evaluate the (complex) target system F(XC) and
-!   its (complex) N x N Jacobian matrix DF(XC).  XC(1:N+1) is in
-!   complex projective coordinates, and the homogeneous coordinate XC(N+1)
-!   is explicitly eliminated from F(XC) and DF(XC) using the projective
-!   transformation (cf. the comments in START_POINTS_GLP).
-!
-!
-! The following objects must be allocated and defined as described in
-! GLOBAL_GLP:
-! 
-! POLYNOMIAL(I)%NUM_TERMS is the number of terms in the Ith component
-!   F_I(X) of the target polynomial system, for I=1,...,N.
-!
-! POLYNOMIAL(I)%TERM(J)%COEF is the coefficient of the Jth term in the Ith
-!   component of the target polynomial system, for J=1,...,NUMT(I), and
-!   I=1,...,N.
-!
-! POLYNOMIAL(I)%TERM(J)%DEG(K) is the degree of the Kth variable in the
-!   Jth term of the Ith component of the target polynomial system, for
-!   K=1,...,N, J=1,...NUMT(I), and I=1,...,N.
-!
-! COVER_SIZES(I) is the number of sets in the Ith component
-!   covering P(I), for I=1,...,N.
-!
-! COVER(I)%SET(J)%NUM_INDICES is the number of indices stored in the
-!   Jth set S(I,J) of the Ith component covering P(I), for
-!   J=1,...,COVER_SIZES(I), and I=1,...,N.
-!
-! COVER(I)SET(J)%INDEX(K) is the index of the Kth variable stored
-!   in the Jth set S(I,J) of the Ith component covering P(I).
-!
-!
-! On output:
-!
-! 
-! PATH_COUNT is the number of paths tracked by a processor.
-!
-! BGLP is the generalized Bezout number corresponding to the
-!   generalized linear product (GLP) formulation defined by the system
-!   set structure P.
-!
-! IFLAG1
-!   = 0  for a normal return.
-!
-!   = -1 if either POLYNOMIAL or COVER was improperly allocated.
-!
-!   = -2 if any POLYNOMIAL(I)%TERM(J)%DEG(K) is less than zero.
-!
-!   = -3 if F_I(X) = CONSTANT for some I.
-!
-!   = -4 if SUM_{J=1}^{COVER_SIZES(I)} 
-!          COVER(I)SET(J)%NUM_INDICES < N, for some I.
-! 
-!   = -5 if UNION_{J=1}^{COVER_SIZES}
-!          S(I,J) /= {1,2,...,N-1,N}, for some I.
-!
-!   = -6 if the optional argument RECALL was present but any of BGLP
-!        or the arrays ARCLEN, IFLAG2, LAMBDA, NFE, ROOTS are
-!        inconsistent with the previous call to POLSYS_GLP.
-!
-!   = -7 if the array SCALE_FACTORS is too small.
-!
-!   = -8 if the input GLP set structure is invalid (inconsistent with
-!        the set structure of the given polynomial).
-!
-! IFLAG2(1:PATH_COUNT) is an integer array which returns information about
-!   each path tracked by a processor.  Precisely, for each path I that was 
-!   tracked, IFLAG2(I):
-!   = 1 + 10*C, where C is the cycle number of the path, for a normal return.
-!
-!   = 2 if the specified error tolerance could not be met.  Increase
-!       TRACKTOL and rerun.
-!
-!   = 3 if the maximum number of steps allowed was exceeded.  To track
-!       the path further, increase NUMRR and rerun the path.
-!
-!   = 4 if the Jacobian matrix does not have full rank.  The algorithm has
-!       failed (the zero curve of the homotopy map cannot be followed any
-!       further).
-!
-!   = 5 if the tracking algorithm has lost the zero curve of the homotopy
-!       map and is not making progress.  The error tolerances TRACKTOL and
-!       FINALTOL were too lenient.  The problem should be restarted with
-!       smaller error tolerances.
-!
-!   = 6 if the normal flow Newton iteration in STEPNX or ROOT_GLP failed
-!       to converge.  The error error tolerances TRACKTOL or FINALTOL may
-!       be too stringent.
-!
-!   = 7 if ROOT_GLP failed to find a root in 10*NUMRR iterations.
-!
-! ARCLEN( I) is the approximate arc length of the Ith path, for I=1,...,BGLP.
-!
-! LAMBDA(I), if MOD(IFLAG2(I),10) = 1, contains an error estimate of
-!   the normalized residual of the scaled, transformed polynomial
-!   system of equations at the scaled, transformed root for the Ith path
-!   (LAMBDA for this path is assumed to be 1). Otherwise LAMBDA(I) is the
-!   final value of the homotopy parameter lambda on the Ith path, for
-!   I=1,...,PATH_COUNT.
-!
-! ROOTS(1:N,I) are the complex roots (untransformed and unscaled) of
-!   the target polynomial corresonding to the Ith path, for I=1,...,BGLP.
-!
-! ROOTS(N+1,I) is the homogeneous variable of the target polynomial
-!   system in complex projective space corresponding to ROOTS(1:N,I).
-!
-! NFE(I) is the number of Jacobian matrix evaluations required to track
-!   the Ith path, for I=1,...,PATH_COUNT.
-!
-! SCALE_FACTORS(1:N) contains the unscaling factors for the variables X(I).
-!   These are needed only on a recall when scaling was done on the original
-!   call to POLSYS_GLP (NO_SCALING was absent).
-
-
-USE GLOBAL_GLP
-IMPLICIT NONE
-
-! Processor path variables.
-INTEGER, INTENT(OUT):: PATH_COUNT
-
-! POLSYS_GLP variables.
-INTEGER, INTENT(IN):: N
-REAL (KIND=R8), INTENT(IN):: TRACKTOL, FINALTOL
-REAL (KIND=R8), INTENT(IN OUT):: SINGTOL
-REAL (KIND=R8), DIMENSION(8), INTENT(IN OUT):: SSPAR
-INTEGER, INTENT(IN OUT):: BGLP, IFLAG1
-INTEGER, DIMENSION(:), POINTER:: IFLAG2
-REAL (KIND=R8), DIMENSION(:), POINTER:: ARCLEN, LAMBDA
-COMPLEX (KIND=R8), DIMENSION(:,:), POINTER:: ROOTS
-INTEGER, DIMENSION(:), POINTER:: NFE
-REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: SCALE_FACTORS
-INTEGER, OPTIONAL, INTENT(IN):: NUMRR
-LOGICAL, OPTIONAL, INTENT(IN):: RECALL, NO_SCALING, USER_F_DF
-
-INTEGER, DIMENSION(:), POINTER:: INDEX_PATH_TRACKED
-
-INTERFACE
-  SUBROUTINE STEPNX(N,NFE,IFLAG,START,CRASH,HOLD,H,RELERR,   &
-      ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-    USE REAL_PRECISION
-    INTEGER, INTENT(IN):: N
-    INTEGER, INTENT(IN OUT):: NFE,IFLAG
-    LOGICAL, INTENT(IN OUT):: START,CRASH
-    REAL (KIND=R8), INTENT(IN OUT):: HOLD,H,RELERR,ABSERR,S,RHOLEN, &
-      SSPAR(8)
-    REAL (KIND=R8), DIMENSION(:), INTENT(IN):: A
-    REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: Y,YP,YOLD,YPOLD, &
-      TZ,W,WP
-    REAL (KIND=R8), DIMENSION(:), ALLOCATABLE, SAVE:: Z0,Z1
-  END SUBROUTINE STEPNX
-END INTERFACE
-
-! Local variables.
-INTEGER:: BTEMP, I, IFLAG, II, ITER, J, JJ, K, KK, LIMIT, MAXPS, &
-  MAXT, NNFE, NUM_RERUNS
-INTEGER, SAVE:: BGLP_SAVE
-INTEGER, DIMENSION(N):: CHECK_PAR, DLEX_NUM, DLEX_SAVE, FLEX_NUM, FLEX_SAVE
-INTEGER, DIMENSION(2*N+1):: PIVOT
-REAL (KIND=R8):: ABSERR, H, HOLD, RELERR, RHOLEN, S
-REAL (KIND=R8), DIMENSION(2*N):: A, DRHOL, RHOV, Z
-REAL (KIND=R8), DIMENSION(2*N+1):: Y, YP, YOLD, YOLDS, YPOLD, TZ, W, WP
-REAL (KIND=R8), DIMENSION(3*(2*N+1)):: ALPHA
-REAL (KIND=R8), DIMENSION(2*N+1,12):: YS
-REAL (KIND=R8), DIMENSION(N,N):: RAND_MAT
-REAL, DIMENSION(N,N):: RANDNUMS
-REAL (KIND=R8), DIMENSION(N+1,N):: MAT
-REAL (KIND=R8), DIMENSION(2*N,2*N):: DRHOX
-REAL (KIND=R8), DIMENSION(2*N,2*N+2):: QR
-COMPLEX (KIND=R8), DIMENSION(N-1):: TAU
-COMPLEX (KIND=R8), DIMENSION(N):: B, F, G, V
-COMPLEX (KIND=R8), DIMENSION(N+1):: PROJ_COEF, XC
-COMPLEX (KIND=R8), DIMENSION(N,N):: AA
-COMPLEX (KIND=R8), DIMENSION(N,N+1):: DF, DG
-COMPLEX (KIND=R8), DIMENSION(:,:), ALLOCATABLE:: TEMP1G, TEMP2G
-LOGICAL:: CRASH, NONSING, START
-
-
-! Parallel computing variables:
-!
-! MASTER_PROC is the processor with rank 0.
-! NUM_PROC is the number of processors requested for the run.
-! PATH_CYCLE is the current number of paths that have been tracked by
-! a processor.
-! PATH_TRACKING is a path index to be distributed by the master to a
-! slave processor.
-! RANK_PROC is an index that denotes a processor.
-
-INTEGER, PARAMETER:: MASTER_PROC = 0 
-INTEGER:: NUM_PROC, PATH_CYCLE, PATH_TRACKING, RANK_PROC
-REAL (KIND=R8):: END_TIME, RUN_TIME, START_TIME
-
-! MPI system variables:
-!
-! IERR is a return error code, not used.
-! MPI_SOURCE is a variable that denotes a processor generating a message.
-! SENDER is a variable indentifying the rank of a processor.
-! STATUS is used to query processors via SENDER = STATUS(MPI_SOURCE).
-
-INTEGER:: IERR, SENDER
-INTEGER, DIMENSION(MPI_STATUS_SIZE):: STATUS
-
-! Set MPI variables to initial values and get current processor rank.
-CALL MPI_COMM_RANK(MPI_COMM_WORLD, RANK_PROC, IERR)
-
-! Determine number of processors requested.
-CALL MPI_COMM_SIZE(MPI_COMM_WORLD, NUM_PROC, IERR)
-
-! Begin input data check.
-
-IFLAG1 = 0  ! Normal return.
-
-! Check that dimensions are valid.
-IF ((N <= 0) .OR. (SIZE(POLYNOMIAL) /= N)          & 
-             .OR. ANY((/(NUMT(I),I=1,N)/) <= 0)    &
-             .OR. (SIZE(COVER) /= N)           &
-             .OR. ANY(COVER_SIZES <= 0)) THEN
-  IFLAG1 = -1
-  RETURN
-END IF
-DO I=1,N
-  IF ((SIZE(POLYNOMIAL(I)%TERM) /= NUMT(I))                   &
-    .OR. (SIZE(COVER(I)%SET) /= COVER_SIZES(I))       &
-    .OR. ANY((/(NUMV(I,J),J=1,COVER_SIZES(I))/) <= 0)) THEN  
-    IFLAG1 = -1
-    RETURN
-  END IF
-END DO
-DO I=1,N
-  DO J=1,NUMT(I)
-    IF (SIZE(POLYNOMIAL(I)%TERM(J)%DEG) /= N + 1) THEN
-      IFLAG1 = -1
-      RETURN
-    END IF
-  END DO
-  DO J=1,COVER_SIZES(I)
-    IF (SIZE(COVER(I)%SET(J)%INDEX) /= NUMV(I,J)) THEN
-      IFLAG1 = -1
-      RETURN
-    END IF
-  END DO
-END DO
-
-! Check that the target system has no negative powers.
-DO I=1,N
-  DO J=1,NUMT(I)
-    IF (ANY(POLYNOMIAL(I)%TERM(J)%DEG(1:N) < 0)) THEN
-      IFLAG1 = -2
-      RETURN
-    END IF
-  END DO
-END DO
-
-! Check that the target system has no constant-valued components.
-DO I=1,N
-  IF (ALL( (/( SUM(POLYNOMIAL(I)%TERM(J)%DEG(1:N)),   & 
-                                 J=1,NUMT(I) )/) == 0)) THEN
-    IFLAG1 = -3
-    RETURN
-  END IF
-END DO
-
-DO I=1,N
-  IF (SUM( (/(NUMV(I,J),J=1,COVER_SIZES(I))/) ) < N) THEN
-    IFLAG1 = -4
-    RETURN
-  END IF
-  CHECK_PAR(1:N) = 0
-  DO J=1,COVER_SIZES(I)
-    DO K=1,NUMV(I,J)
-      CHECK_PAR(PAR(I,J,K)) = CHECK_PAR(PAR(I,J,K)) + 1
-    END DO
-  END DO
-  IF (ANY(CHECK_PAR < 1)) THEN
-    IFLAG1 = -5
-    RETURN
-  END IF
-END DO
-
-
-! Check consistency on a recall.
-IF (PRESENT(RECALL)) THEN
-  IF ( (BGLP /= BGLP_SAVE) .OR. (SIZE(ARCLEN) < BGLP)              &
-                           .OR. (SIZE(IFLAG2) < BGLP)              &
-                           .OR. (SIZE(LAMBDA) < BGLP)              &
-                           .OR. (SIZE(NFE) < BGLP)                 &
-                           .OR. (SIZE(ROOTS,DIM=2) < BGLP) ) THEN
-    IFLAG1 = -6
-    RETURN
-  END IF
-END IF
-
-! Check SCALE_FACTORS array size.
-IF (SIZE(SCALE_FACTORS) < N) THEN
-  IFLAG1 = -7
-  RETURN
-END IF
-
-! End input data check.
-
-! Initialize the POINTER aguments of POLSYS_GLP.
-MAXT = MAXVAL((/(NUMT(I),I=1,N)/))
-IF ( .NOT. PRESENT(RECALL)) THEN
-  
-  ! Return error if GLP set structure not valid.
-  CALL BEZOUT_GLP(N,MAXT,SINGTOL,BGLP)
-  IF (BGLP < 0 ) THEN
-    IFLAG1 = -8 ! Invalid GLP covering.
-    RETURN
-  END IF
-
-  BGLP_SAVE = BGLP  ! Save Bezout number for recall check.
-  
-  IF (ASSOCIATED(ARCLEN)) THEN
-    IF (SIZE(ARCLEN) < BGLP) THEN
-      DEALLOCATE(ARCLEN) ; ALLOCATE(ARCLEN(BGLP))
-    END IF
-  ELSE
-    ALLOCATE(ARCLEN(BGLP))
-  END IF
-  IF (ASSOCIATED(IFLAG2)) THEN
-    IF (SIZE(IFLAG2) < BGLP) THEN
-      DEALLOCATE(IFLAG2) ; ALLOCATE(IFLAG2(BGLP))
-    END IF
-  ELSE
-    ALLOCATE(IFLAG2(BGLP))
-  END IF
-  
-  IF(RANK_PROC==MASTER_PROC) THEN
-    IFLAG2 = -2
-  ELSE
-    IFLAG2 = 0
-  END IF
-  
-  IF (ASSOCIATED(NFE)) THEN
-    IF (SIZE(NFE) < BGLP) THEN
-      DEALLOCATE(NFE) ; ALLOCATE(NFE(BGLP))
-    END IF
-  ELSE
-    ALLOCATE(NFE(BGLP))
-  END IF
-  IF (ASSOCIATED(LAMBDA)) THEN
-    IF (SIZE(LAMBDA) < BGLP) THEN
-      DEALLOCATE(LAMBDA) ; ALLOCATE(LAMBDA(BGLP))
-    END IF
-  ELSE
-    ALLOCATE(LAMBDA(BGLP))
-  END IF
-  IF (ASSOCIATED(ROOTS)) THEN
-      DEALLOCATE(ROOTS) ; ALLOCATE(ROOTS(N+1,BGLP))
-  ELSE
-    ALLOCATE(ROOTS(N+1,BGLP))
-  END IF
-  IF (ASSOCIATED(INDEX_PATH_TRACKED)) THEN
-    IF (SIZE(INDEX_PATH_TRACKED) < BGLP) THEN
-      DEALLOCATE(INDEX_PATH_TRACKED); ALLOCATE(INDEX_PATH_TRACKED(BGLP))
-    ENDIF
-  ELSE
-   ALLOCATE(INDEX_PATH_TRACKED(BGLP))
-  END IF
-END IF
-
-! Allocate storage for the start system.
-DO I=1,N
-  DO J=1,COVER_SIZES(I)
-    ALLOCATE(COVER(I)%SET(J)%START_COEF(NUMV(I,J))) 
-  END DO
-END DO
-
-! Allocate working space for homotopy map derivative calculation.
-MAXPS = MAXVAL(COVER_SIZES)                  
-ALLOCATE(TEMP1G(N,MAXPS), TEMP2G(N,MAXPS))        
-
-! Get real random numbers uniformly distributed in [-1,-1/2] union
-! [1/2,1] for RAND_MAT, which is used in SINGSYS_GLP. 
-CALL RANDOM_NUMBER(HARVEST=RANDNUMS)
-RANDNUMS = RANDNUMS - 0.5 + SIGN(0.5,RANDNUMS - 0.5)
-RAND_MAT = REAL(RANDNUMS,KIND=R8)
-
-! Set default value for singularity threshold SINGTOL in SINGSYS_GLP.
-IF (SINGTOL <= REAL(N,KIND=R8)*EPSILON(1.0_R8))  &
-    SINGTOL = SQRT(EPSILON(1.0_R8))
-
-! Scale the target polynomial system as requested.
-IF (PRESENT(NO_SCALING)) THEN
-  SCALE_FACTORS = 0.0_R8
-ELSE IF (.NOT. PRESENT(RECALL)) THEN
-  CALL SCALE_GLP
-END IF
-
-! Initialize the start system for the homotopy map.
-CALL INIT_GLP
-
-! Set main loop initial values.
-FLEX_NUM(1:N-1) = 1
-FLEX_NUM(N) = 0
-FLEX_SAVE = 0
-IF (PRESENT(NUMRR)) THEN
-  NUM_RERUNS = MAX(NUMRR,1)
-ELSE
-  NUM_RERUNS = 1
-END IF
-
-PATH_COUNT = 0
-PATH_CYCLE = 0
-PATH_TRACKING = 0
-INDEX_PATH_TRACKED = 0
-
-IF (NUM_PROC > 1 .AND. RANK_PROC==MASTER_PROC) THEN
-  ! Executed by master processor.
-  START_TIME = MPI_WTIME()
-  J = MAX(1, (BGLP)/100)
-  K = 1
-  JJ = 1
-  DO I=1,BGLP
-    IF(IFLAG2(I) /= -2) CYCLE
-    ! Receive message from slave processor.
-    CALL MPI_RECV(PATH_TRACKING,1,MPI_INTEGER,MPI_ANY_SOURCE,&
-       MPI_ANY_TAG,MPI_COMM_WORLD,STATUS,IERR)
-    ! Get the rank of the sender.
-    SENDER = STATUS(MPI_SOURCE)
-
-    PATH_TRACKING = I
-    ! Send next path index.
-    CALL MPI_SEND(PATH_TRACKING,1,MPI_INTEGER,SENDER,SENDER,&
-       MPI_COMM_WORLD,IERR)
-
-    ! Print to standard out for each 1% of total paths completed by
-    ! uncommenting the WRITE statements below.
-    IF (K < J ) THEN 
-      K = K + 1
-    ELSE 
-      K = 1
-      END_TIME = MPI_WTIME()
-      RUN_TIME = END_TIME - START_TIME
-
-    ! WRITE (*,100) NINT(100.0*J*JJ/BGLP), J*JJ, BGLP, &
-    !    RUN_TIME*(BGLP-I)/I
-    ! 100 FORMAT(I3, "% or", I6, " out of ", I6, " paths completed.  ", &
-    !            ES12.4, " seconds left.")
-      JJ = JJ + 1
-    END IF
-  END DO
-  
-  ! Send end of job message to all slave processors.
-  DO I=1,NUM_PROC-1
-    CALL MPI_RECV(PATH_TRACKING,1,MPI_INTEGER,MPI_ANY_SOURCE,&
-       MPI_ANY_TAG,MPI_COMM_WORLD,STATUS,IERR)
-    SENDER = STATUS(MPI_SOURCE)
-    CALL MPI_SEND(MPI_BOTTOM,0,MPI_INTEGER,SENDER,0,&
-       MPI_COMM_WORLD,IERR)
-  END DO
-
-ELSE ! Executed by slave processors.
-
-! If only one processor is specified, then parallel code is not executed.
-IF (NUM_PROC > 1) THEN
-  ! Request a path from master processor.
-  CALL MPI_SEND(PATH_TRACKING,1,MPI_INTEGER,MASTER_PROC,MASTER_PROC,&
-                MPI_COMM_WORLD,IERR)
-  ! Receive a path from master processor.
-  CALL MPI_RECV(PATH_TRACKING,1,MPI_INTEGER,MASTER_PROC,&
-                MPI_ANY_TAG,MPI_COMM_WORLD,STATUS,IERR)
-  IF (STATUS(MPI_TAG) /= 0) THEN
-    IFLAG2(PATH_TRACKING) = -2
-  ELSE
-    GO TO 1000
-  END IF
-END IF
-
-! Main loop over all possible lexicographic vectors FLEX_NUM(1:N)
-! corresponding to linear factors.
-
-MAIN_LOOP: &
-DO 
-
-  DO J=N,1,-1
-    IF (FLEX_NUM(J) < COVER_SIZES(J)) THEN
-      K = J
-      EXIT      
-    END IF
-  END DO 
-  FLEX_NUM(K) = FLEX_NUM(K) + 1
-  IF (K + 1 <= N) THEN
-    FLEX_NUM(K+1:N) = 1
-  END IF
-  ! Check if the subsystem of the start system defined by the
-  ! lexicographic vector FLEX_NUM is singular. 
-  CALL SINGSYS_GLP(N,FLEX_NUM,FLEX_SAVE,SINGTOL,RAND_MAT,MAT,NONSING)
-
-  ! If the subsystem is nonsingular, track a path.
-  NONSING_START_POINT: IF (NONSING) THEN
-    BTEMP = PRODUCT( (/(SD(I,FLEX_NUM(I)),I=1,N)/) )
-    DLEX_NUM(1:N-1) = 1
-    DLEX_NUM(N) = 0
-    DLEX_SAVE = 0
-  
-    ! Cycle through all lexicographic vectors DLEX_NUM(1:N) corresponding
-    ! to roots of unity, defined by the set degrees specified in
-    ! (/(SD(I,FLEX_NUM(I)),I=1,N)/).
-    SD_LEX_LOOP: DO II=1,BTEMP
-      DO JJ=N,1,-1
-        IF (DLEX_NUM(JJ) < SD(JJ,FLEX_NUM(JJ))) THEN
-          KK = JJ
-          EXIT
-        END IF
-      END DO
-      DLEX_NUM(KK) = DLEX_NUM(KK) + 1
-      IF (KK + 1 <= N) THEN
-         DLEX_NUM(KK+1:N) = 1
-      END IF
-       
-      PATH_CYCLE = PATH_CYCLE + 1
-      
-      IF (IFLAG2(PATH_CYCLE) /= -2) CYCLE SD_LEX_LOOP
-      
-      PATH_COUNT = PATH_COUNT + 1
-      
-      INDEX_PATH_TRACKED(PATH_COUNT) = PATH_CYCLE
-      
-      ! Get the start point for the homotopy path defined by FLEX_NUM and
-      ! DLEX_NUM.
-      CALL START_POINTS_GLP
-  
-      NNFE = 0
-      IFLAG = -2
-      Y(1) = 0.0_R8 ; Y(2:2*N+1) = Z(1:2*N)
-      YP(1) = 1.0_R8 ;  YP(2:2*N+1) = 0.0_R8
-      YOLD = Y ;  YPOLD = YP
-      HOLD = 1.0_R8 ; H = 0.1_R8
-      S = 0.0_R8
-      LIMIT = 1000*NUM_RERUNS
-      START = .TRUE.
-      CRASH = .FALSE.
-  
-      ! Track the homotopy path.
-  
-      TRACKER: DO ITER=1,LIMIT
-        IF (Y(1) < 0.0_R8) THEN
-          IFLAG = 5
-          EXIT TRACKER
-        END IF
-  
-        ! Set different error tolerance if the trajectory Y(S) has any high
-        ! curvature components.
-        RELERR = TRACKTOL
-        ABSERR = TRACKTOL
-        IF (ANY(ABS(YP - YPOLD) > 10.0_R8*HOLD)) THEN
-          RELERR = FINALTOL
-          ABSERR = FINALTOL
-        END IF
-  
-        ! Take a step along the homotopy zero curve.
-        CALL STEP_GLP
-        IF (IFLAG > 0) THEN
-          EXIT TRACKER
-        END IF
-        IF (Y(1) >= .97_R8) THEN
-          RELERR = FINALTOL
-          ABSERR = FINALTOL
-  
-          ! Enter end game.
-          CALL ROOT_GLP
-          EXIT TRACKER
-        END IF
-  
-        ! D LAMBDA/DS >= 0 necessarily.  This condition is forced here.
-        IF (YP(1) < 0.0_R8) THEN
-  
-          ! Reverse the tangent direction so D LAMBDA/DS = YP(1) > 0.
-          YP = -YP
-          YPOLD = YP
-  
-          ! Force STEPNX to use the linear predictor for the next step only.
-          START = .TRUE.
-        END IF
-      END DO TRACKER
-  
-      ! Set error flag if limit on number of steps exceeded.
-      IF (ITER >= LIMIT) IFLAG = 3
-  
-      ARCLEN(PATH_COUNT) = S
-      NFE(PATH_COUNT) = NNFE
-      IFLAG2(PATH_COUNT) = IFLAG
-      LAMBDA(PATH_COUNT) = Y(1)
-  
-      ! Convert from real to complex arithmetic.
-      XC(1:N) = CMPLX(Y(2:2*N:2),Y(3:2*N+1:2),KIND=R8)
-  
-      ! Untransform and unscale solutions.
-      CALL OUTPUT_GLP
-      ROOTS(1:N,PATH_COUNT) = XC(1:N)
-      ROOTS(N+1,PATH_COUNT) = XC(N+1)
-      
-      ! One path tracking finished, request another one.
-      ! If only one processor is specified, then parallel code is not executed.
-      IF (NUM_PROC > 1 ) THEN 
-        ! Request a path from master processor.
-        CALL MPI_SEND(PATH_TRACKING,1,MPI_INTEGER,MASTER_PROC,MASTER_PROC,&
-                      MPI_COMM_WORLD,IERR)
-        ! Receive a path from master processor.
-        CALL MPI_RECV(PATH_TRACKING,1,MPI_INTEGER,MASTER_PROC,&
-                      MPI_ANY_TAG,MPI_COMM_WORLD,STATUS,IERR)
-        IF (STATUS(MPI_TAG) /= 0)  THEN 
-          IFLAG2(PATH_TRACKING) = -2
-        ELSE ! No more jobs.
-          EXIT MAIN_LOOP
-        END IF
-      END IF
-      
-    END DO SD_LEX_LOOP
-  END IF NONSING_START_POINT
-  
-  IF (ALL(FLEX_NUM == COVER_SIZES)) THEN
-     EXIT MAIN_LOOP
-  END IF      
-
-END DO MAIN_LOOP
-
-END IF 
-
-
-! Clean up working storage in STEPNX.
-1000 IFLAG = -42
-CALL STEPNX (2*N,NNFE,IFLAG,START,CRASH,HOLD,H,RELERR, &
-  ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-
-! Deallocate the storage for the start system and working storage.
-DO I=1,N
-  DO J=1,COVER_SIZES(I)
-    DEALLOCATE(COVER(I)%SET(J)%START_COEF)
-  END DO
-END DO
-DEALLOCATE(TEMP1G,TEMP2G)
-RETURN
-
-CONTAINS
-
-                                                                     !!!
-SUBROUTINE SCALE_GLP
-! SCALE_GLP scales the complex coefficients of a polynomial system of N
-! equations in N unknowns, F(X)=0, where the Jth term of the Ith equation
-! looks like 
-!
-!    C(I,J) * X(1)**D(I,J,1) ... X(N)**D(I,J,N).
-!
-! The Ith equation is scaled by 10**FACE(I).  The Kth variable is scaled
-! by 10**FACV(K).  In other words, X(K)=10**FACV(K)*Y(K), where Y solves
-! the scaled equation.  The scaled equation has the same form as the
-! original, except that CSCL(I,J) replaces POLYNOMIAL(I)%TERM(J)%COEF,
-! where 
-!
-! CSCL(I,J)=C(I,J)*10**(FACE(I)+FACV(1)*D(I,J,1)+...+FACV(N)*D(I,J,N)).
-!
-! The criterion for generating FACE and FACV is that of minimizing the
-! sum of squares of the exponents of the scaled coefficients.  It turns
-! out that this criterion reduces to solving a single linear system,
-! ALPHA*X=BETA, as defined in the code below.  See Meintjas and Morgan,
-! "A methodology for solving chemical equilibrium problems," General
-! Motors Research Laboratories Technical Report GMR-4971.
-!
-! Calls the LAPACK routines DGEQRF, DORMQR, and the BLAS routines
-! DTRSV and IDAMAX.
-!
-! On exit:
-!
-! SCALE_FACTORS(K) = FACV(K) is the scale factor for X(K), K=1,...,N.
-!  Precisely, the unscaled solution
-!  X(K) = 10**FACV(K) * (computed scaled solution).
-!
-! POLYNOMIAL(I)%TERM(J)%COEF = CSCL(I,J) is the scaled complex
-!  coefficient, for J=1,...,NUMT(I), and I=1,...,N.
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: COUNT, I, ICMAX, IRMAX, J, K, L, LENR
-INTEGER, DIMENSION(N):: NNUMT
-INTEGER, DIMENSION(N,MAXT,N):: DDEG 
-REAL (KIND=R8):: DUM, RTOL, TUM
-REAL (KIND=R8), DIMENSION(:), POINTER:: FACE, FACV
-REAL (KIND=R8), DIMENSION(2*N), TARGET:: BETA, RWORK, XWORK
-REAL (KIND=R8), DIMENSION(2*N,2*N):: ALPHA
-REAL (KIND=R8), DIMENSION(N,MAXT):: CMAG
-
-INTERFACE
-  INTEGER FUNCTION IDAMAX(N,X,STRIDE)
-    USE REAL_PRECISION
-    INTEGER:: N,STRIDE
-    REAL (KIND=R8), DIMENSION(N):: X
-  END FUNCTION IDAMAX
-END INTERFACE
-
-LENR = N*(N+1)/2
-SCALE_FACTORS(1:N) = 0.0_R8 ! This corresponds to no scaling.
-
-! Delete exact zero coefficients, just for scaling.
-NNUMT = 0
-DO I=1,N
-  COUNT = 0
-  DO J=1,NUMT(I)
-    IF (ABS(C(I,J)) > 0.0_R8) THEN
-      COUNT = COUNT + 1
-      NNUMT(I) = NNUMT(I) + 1
-      CMAG(I,COUNT) = LOG10(ABS(C(I,J)))
-      DDEG(I,COUNT,1:N) = (/(D(I,J,K),K=1,N)/)
-    END IF
-  END DO
-END DO
-
-! Generate the matrix ALPHA.
-ALPHA(1:N,1:N) = 0.0_R8
-DO I=1,N
-  ALPHA(I,I) = REAL(NNUMT(I),KIND=R8)
-END DO
-DO I=1,N
-  ALPHA(N+1:2*N,I) = REAL(SUM(DDEG(I,1:NNUMT(I),1:N),DIM=1),KIND=R8)
-END DO
-DO L=1,N
-  DO K=1,L
-    ICMAX = 0
-    DO I=1,N
-      ICMAX = ICMAX + DOT_PRODUCT(DDEG(I,1:NNUMT(I),L),DDEG(I,1:NNUMT(I),K))
-    END DO
-    ALPHA(N+L,N+K) = REAL(ICMAX,KIND=R8)
-    ALPHA(N+K,N+L) = ALPHA(N+L,N+K)
-  END DO
-END DO
-ALPHA(1:N,N+1:2*N) = TRANSPOSE(ALPHA(N+1:2*N,1:N))
-
-! Compute the QR-factorization of the matrix ALPHA.
-CALL DGEQRF(2*N,2*N,ALPHA,2*N,XWORK,BETA,2*N,I)
-
-! Check for ill-conditioned scaling matrix.
-IRMAX = 1
-ICMAX = 1
-DO J=2,N
-  I = IDAMAX(J,ALPHA(1,J),1)
-  IF (ABS(ALPHA(I,J)) > ABS(ALPHA(IRMAX,ICMAX))) THEN 
-    IRMAX = I
-    ICMAX = J
-  END IF
-END DO
-RTOL = ABS(ALPHA(IRMAX,ICMAX))*EPSILON(1.0_R8)*REAL(N,KIND=R8)
-DO I=1,N
-  IF (ABS(ALPHA(I,I)) < RTOL) THEN  ! ALPHA is ill conditioned.
-    RETURN  ! Default to no scaling at all.
-  END IF
-END DO
-
-! Generate the column BETA.
-DO K=1,N
-  BETA(K) = -SUM(CMAG(K,1:NNUMT(K)))
-  TUM = 0.0_R8
-  DO I=1,N
-    TUM = TUM + SUM(CMAG(I,1:NNUMT(I)) * REAL(DDEG(I,1:NNUMT(I),K),KIND=R8))
-  END DO
-  BETA(N+K) = -TUM
-END DO
-
-! Solve the linear system ALPHA*X=BETA.
-CALL DORMQR('L','T',2*N,1,2*N-1,ALPHA,2*N,XWORK,BETA,2*N,RWORK,2*N,I)  
-CALL DTRSV('U','N','N',2*N,ALPHA,2*N,BETA,1) 
-
-! Generate FACE, FACV, and the scaled coefficients CSCL(I,J).
-FACE => BETA(1:N)
-FACV => BETA(N+1:2*N)
-DO I=1,N
-  DO J=1,NUMT(I)
-    DUM = ABS(C(I,J))
-    IF (DUM /= 0.0) THEN
-      TUM = FACE(I) + LOG10(DUM) + DOT_PRODUCT(FACV(1:N), &
-                                   POLYNOMIAL(I)%TERM(J)%DEG(1:N))
-      POLYNOMIAL(I)%TERM(J)%COEF = (10.0_R8**TUM) * (C(I,J)/DUM)
-    ENDIF
-  END DO
-END DO
-
-SCALE_FACTORS(1:N) = FACV(1:N)
-RETURN
-END SUBROUTINE SCALE_GLP
-
-                                                                     !!!
-SUBROUTINE INIT_GLP
-! INIT_GLP homogenizes the homotopy map, and harvests random complex
-! numbers which define the start system and the projective transformation.
-! 
-!
-! On exit:
-!
-! POLYNOMIAL(I)%TERM(J)%DEG(N+1) is the degree of the homogeneous variable
-!  in the Jth term of the Ith component of the target system.
-!
-! COVER(I)%SET(J)%START_COEF(K) is the coefficient of X(PAR(I,J,K)) in
-!  the linear factor L(I,J).  (L(I,J) is defined in GLOBAL_GLP.)  
-!
-! PROJ_COEF(I) is the coefficient of X(I) in the projective transformation,
-!  when I=1,...,N, and the constant term in the projective transformation,
-!  when I=N+1. 
-!
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: COUNT, I, J, K, SEED_SIZE
-INTEGER, DIMENSION(:), ALLOCATABLE:: SEED
-REAL, DIMENSION(N*N+N+1,2):: RANDS
-REAL (KIND=R8), DIMENSION(N*N+N+1,2):: RANDSR8
-
-! Construct the homogenization of the homotopy map.  Note: 
-! Homogenization of the start system is implicit.
-DO I=1,N
-  DO J=1,NUMT(I)
-    POLYNOMIAL(I)%TERM(J)%DEG(N+1) = SUM((/(SD(I,K),K=1, &
-      COVER_SIZES(I))/)) - SUM(POLYNOMIAL(I)%TERM(J)%DEG(1:N))
-  END DO
-END DO
-
-! Get the random coefficients START_COEF which define the start system
-! and the random coefficients PROJ_COEF which define the projective
-! transformation.
-
-!CALL RANDOM_SEED(SIZE=SEED_SIZE)  ! Explicit seed used by POLSYS_PLP;
-!ALLOCATE(SEED(SEED_SIZE))         ! default system seed will be used here.
-!SEED(1:SEED_SIZE) = 32749
-!CALL RANDOM_SEED(PUT=SEED(1:SEED_SIZE))
-CALL RANDOM_SEED
-CALL RANDOM_NUMBER(HARVEST=RANDS)
-!DEALLOCATE(SEED)
-
-RANDS = 2.0 * RANDS - 1.0
-RANDSR8 = REAL(RANDS,KIND=R8)
-COUNT = 1
-DO I=1,N
-  DO J=1,COVER_SIZES(I)
-    DO K=1,NUMV(I,J)
-      COVER(I)%SET(J)%START_COEF(K) = CMPLX(RANDSR8(COUNT,1),  &
-        RANDSR8(COUNT,2),KIND=R8)
-      COUNT = COUNT + 1
-    END DO
-  END DO
-END DO
-PROJ_COEF(1:N+1) = CMPLX(RANDSR8(COUNT:COUNT+N,1),  &
-  RANDSR8(COUNT:COUNT+N,2),KIND=R8)
-
-RETURN
-END SUBROUTINE INIT_GLP
-
-                                                                     !!!
-SUBROUTINE START_POINTS_GLP
-! START_POINTS_GLP finds a starting point for the homotopy map
-! corresponding to the lexicographic vector FLEX_NUM (defining the
-! variable sets) and the lexicographic vector DLEX_NUM (defining the
-! particular start point among all those defined by FLEX_NUM).  The
-! (complex) start point z is the solution to a nonsingular linear system
-! AA z = B, defined by (cf. the notation in the module GLOBAL_GLP)
-!
-! L(1,FLEX_NUM(1)) - R(DLEX_NUM(1)-1,SD(1,FLEX_NUM(1))) * X(N+1) = 0,
-! .
-! .
-! .
-! L(N,FLEX_NUM(N)) - R(DLEX_NUM(N)-1,SD(N,FLEX_NUM(N))) * X(N+1) = 0,
-! X(N+1) = SUM_{J=1}^N PROJ_COEF(J)*X(J) + PROJ_COEF(N+1),
-!
-! where the last equation is the projective transformation, X(N+1) is
-! the homogeneous coordinate, and R(K,M)=e**(i*2*PI*K/M) is an Mth root
-! of unity.  The homogeneous variable X(N+1) is explicitly eliminated,
-! resulting in an N x N complex linear system for z=(X(1),...,X(N)).
-!
-! START_POINTS_GLP calculates a start point in an efficient way:  For each
-! fixed lexicographic number LEX_NUM, the routine reuses, if possible,
-! previous Householder reflections in the LQ decomposition of AA.
-!
-! Calls the LAPACK routines ZLARFG, ZLARFX, the BLAS routine ZTRSV, and the
-! internal function ROOT_OF_UNITY. 
-!
-! On exit:
-!
-! Z(1:2N) is a real vector representing the (complex) start point z.
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: I, J, K
-COMPLEX (KIND=R8):: ROOT, WORK(1)
-
-! (Re)set the coefficient matrix AA, and set B.
-DO I=1,N
-  IF (DLEX_SAVE(I) /= DLEX_NUM(I)) THEN
-    DLEX_SAVE(I+1:N) = 0
-    DO J=1,N
-      ROOT = ROOT_OF_UNITY(DLEX_NUM(J)-1,SD(J,FLEX_NUM(J)))
-      B(J) = ROOT * PROJ_COEF(N+1)
-      IF (J >= I) THEN
-        AA(J,1:N) = (0.0_R8,0.0_R8)
-        K = NUMV(J,FLEX_NUM(J))
-        AA(J,COVER(J)%SET(FLEX_NUM(J))%INDEX(1:K)) = &
-          COVER(J)%SET(FLEX_NUM(J))%START_COEF(1:K)
-        AA(J,1:N) = AA(J,1:N) - PROJ_COEF(1:N) * ROOT
-      END IF
-    END DO
-    EXIT
-  END IF
-END DO
-
-! Special code for the case N=1.
-IF (N == 1) THEN
-  WORK(1) = B(1)/AA(1,1)
-  Z(1) = REAL(WORK(1))
-  Z(2) = AIMAG(WORK(1))
-  DLEX_SAVE = DLEX_NUM
-  RETURN
-END IF
-
-! Update the LQ factorization of AA.
-IF (DLEX_SAVE(1) /= DLEX_NUM(1)) THEN
-  AA(1,1:N) = CONJG(AA(1,1:N))
-  CALL ZLARFG(N,AA(1,1),AA(1,2:N),1,TAU(1))
-END IF
-DO I=2,N
-  IF (DLEX_SAVE(I) /= DLEX_NUM(I)) THEN
-    DO J=1,I-1
-      V(J) = (1.0_R8,0.0_R8)
-      V(J+1:N) = AA(J,J+1:N)
-      CALL ZLARFX('R',1,N-J+1,V(J:N),TAU(J),AA(I,J:N),1,WORK)
-    END DO
-    IF (I < N) THEN
-      AA(I,I:N) = CONJG(AA(I,I:N))
-      CALL ZLARFG(N-I+1,AA(I,I),AA(I,I+1:N),1,TAU(I))
-    END IF
-  END IF
-END DO
-DLEX_SAVE = DLEX_NUM
-
-! Solve the linear system AA Z = B, by solving L Q Z = B.
-
-! L W = B.
-CALL ZTRSV('L','N','N',N,AA(1:N,1:N),N,B(1:N),1)
-! Z = CONJG(Q') W.
-DO I=N-1,1,-1
-  V(I) = (1.0_R8,0.0_R8)
-  V(I+1:N) = AA(I,I+1:N)
-  CALL ZLARFX('L',N-I+1,1,V(I:N),TAU(I),B(I:N),N,WORK)
-END DO
-
-! Convert the complex start point to a real vector.
-Z(1:2*N:2) = REAL(B)
-Z(2:2*N:2) = AIMAG(B)
-RETURN
-END SUBROUTINE START_POINTS_GLP
-
-                                                                     !!!
-COMPLEX (KIND=R8) FUNCTION ROOT_OF_UNITY(K,N) RESULT(RU)
-! RU = e**(i*2*PI*K/N).
-  IMPLICIT NONE
-  INTEGER:: K, N
-  REAL (KIND=R8):: ANGLE
-  ANGLE = 2.0_R8*PI*(REAL(K,KIND=R8)/REAL(N,KIND=R8))
-  RU = CMPLX(COS(ANGLE),SIN(ANGLE),KIND=R8)
-  RETURN
-END FUNCTION ROOT_OF_UNITY
-
-                                                                     !!!
-SUBROUTINE STEP_GLP
-
-! Driver for reverse call external subroutine STEPNX from HOMPACK90.
-
-IMPLICIT NONE
-INTEGER:: FAIL,IFLAGS
-FAIL=0
-STEP: DO
-  CALL STEPNX(2*N,NNFE,IFLAG,START,CRASH,HOLD,H,RELERR, &
-    ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-  IF (CRASH) THEN
-    IFLAG = 2
-    EXIT
-  END IF
-  IFLAGS = IFLAG
-  SELECT CASE (IFLAGS)
-    CASE (-2)      ! Successful step.
-      EXIT
-    CASE (-12)     ! Compute tangent vector.
-      RHOLEN = 0.0_R8
-      CALL TANGENT_GLP
-      IF (IFLAG == 4) THEN
-        IFLAG = IFLAGS - 100
-        FAIL = FAIL + 1
-      ENDIF
-    CASE (-32,-22) ! Compute tangent vector and Newton step.
-      RHOLEN = -1.0_R8
-      CALL TANGENT_GLP(NEWTON_STEP=.TRUE.)
-      IF (IFLAG == 4) THEN
-        IFLAG = IFLAGS - 100
-        FAIL = FAIL + 1
-      ENDIF
-    CASE (4,6) ! STEPNX failed.
-      EXIT
-  END SELECT
-  IF (FAIL == 2) THEN
-    IFLAG = 4 ; RETURN
-  ENDIF
-END DO STEP
-RETURN
-END SUBROUTINE STEP_GLP
-
-                                                                     !!!
-SUBROUTINE TANGENT_GLP(NEWTON_STEP)
-! This subroutine builds the Jacobian matrix of the homotopy map,
-! computes a QR decomposition of that matrix, and then calculates the
-! (unit) tangent vector and (if NEWTON_STEP is present) the Newton
-! step.
-!
-! On input:
-!
-! NEWTON_STEP is a logical optional argument which, if present,
-!    indicates that the Newton step is also to be calculated.
-!
-! RHOLEN < 0 if the norm of the homotopy map evaluated at
-!    (LAMBDA, X) is to be computed.  If  RHOLEN >= 0  the norm is not
-!    computed and RHOLEN is not changed.
-!
-! W(1:2*N+1) = current point (LAMBDA(S), X(S)).
-!
-! YPOLD(1:2*N+1) = unit tangent vector at previous point on the zero
-!    curve of the homotopy map.
-!
-! On output:
-!
-! RHOLEN = ||RHO(LAMBDA(S), X(S))|| if  RHOLEN < 0  on input.
-!    Otherwise RHOLEN is unchanged.
-!
-! WP(1:2*N+1) = dW/dS = unit tangent vector to integral curve of
-!    d(homotopy map)/dS = 0  at  W(S) = (LAMBDA(S), X(S)) .
-!
-! TZ = the Newton step = -(pseudo inverse of  (d RHO(W(S))/d LAMBDA ,
-!    d RHO(W(S))/dX)) * RHO(W(S)) .
-!
-! IFLAG  is unchanged, unless the QR factorization detects a rank < N,
-!    in which case the tangent and Newton step vectors are not computed
-!    and TANGENT_GLP returns with  IFLAG = 4 .
-!
-!
-! Calls  DGEQPF, DNRM2, DORMQR, RHO.
-
-IMPLICIT NONE
-LOGICAL, INTENT(IN), OPTIONAL:: NEWTON_STEP
-REAL (KIND=R8):: LAMBDA, SIGMA, WPNORM
-INTEGER:: I, J, K
-
-INTERFACE
-  FUNCTION DNRM2(N,X,STRIDE)
-    USE REAL_PRECISION
-    INTEGER:: N,STRIDE
-    REAL (KIND=R8):: DNRM2,X(N)
-  END FUNCTION DNRM2
-END INTERFACE
-
-! Compute the Jacobian matrix, store it and homotopy map in QR.
-!
-!  QR = ( D RHO(LAMBDA,X)/D LAMBDA , D RHO(LAMBDA,X)/DX ,
-!                                              RHO(LAMBDA,X) )  .
-!
-! Force LAMBDA >= 0 for tangent calculation.
-IF (W(1) < 0.0_R8) THEN
-  LAMBDA = 0.0_R8
-ELSE
-  LAMBDA = W(1)
-END IF
-
-! RHO(W) evaluates the homotopy map and its Jacobian matrix at W,
-! leaving the results in the arrays RHOV, DRHOL, and DRHOX.
-CALL RHO(LAMBDA,W(2:2*N+1))
-QR(1:2*N,1) = DRHOL(1:2*N)
-QR(1:2*N,2:2*N+1) = DRHOX(1:2*N,1:2*N)
-QR(1:2*N,2*N+2) = RHOV(1:2*N)
-
-! Compute the norm of the homotopy map if it was requested.
-IF (RHOLEN < 0.0_R8) RHOLEN = DNRM2(2*N,QR(:,2*N+2),1)
-
-! Reduce the Jacobian matrix to upper triangular form.
-PIVOT = 0
-CALL DGEQPF(2*N,2*N+1,QR,2*N,PIVOT,WP,ALPHA,K)
-
-IF (ABS(QR(2*N,2*N)) <= ABS(QR(1,1))*EPSILON(1.0_R8)) THEN 
-  IFLAG = 4
-  RETURN
-ENDIF
-
-! Apply Householder reflections to last column of QR (which contains
-! RHO(A,W)).
-CALL DORMQR('L','T',2*N,1,2*N-1,QR,2*N,WP,QR(:,2*N+2),2*N,  &
-  ALPHA, 3*(2*N+1),K)
-
-! Compute kernel of Jacobian matrix, yielding WP=dW/dS.
-TZ(2*N+1) = 1.0_R8
-DO I=2*N,1,-1
-  J = I + 1
-  TZ(I) = -DOT_PRODUCT(QR(I,J:2*N+1),TZ(J:2*N+1))/QR(I,I)
-END DO
-WPNORM = DNRM2(2*N+1,TZ,1)
-WP(PIVOT) = TZ/WPNORM
-IF (DOT_PRODUCT(WP,YPOLD) < 0.0_R8) WP = -WP
-
-! WP is the unit tangent vector in the correct direction.
-IF (.NOT. PRESENT(NEWTON_STEP)) RETURN
-
-! Compute the minimum norm solution of [d RHO(W(S))] V = -RHO(W(S)).
-! V is given by  P - (P,Q)Q  , where P is any solution of
-! [d RHO] V = -RHO  and Q is a unit vector in the kernel of [d RHO].
-
-ALPHA(2*N+1) = 1.0_R8
-DO I=2*N,1,-1
-  J = I + 1
-  ALPHA(I) = -(DOT_PRODUCT(QR(I,J:2*N+1),ALPHA(J:2*N+1)) + QR(I,2*N+2)) &
-            /QR(I,I)
-END DO
-TZ(PIVOT) = ALPHA(1:2*N+1)
-
-! TZ now contains a particular solution P, and WP contains a vector Q
-! in the kernel (the unit tangent).
-SIGMA = DOT_PRODUCT(TZ,WP)
-TZ = TZ - SIGMA*WP
-
-! TZ is the Newton step from the current point W(S) = (LAMBDA(S), X(S)).
-RETURN
-END SUBROUTINE TANGENT_GLP
-
-                                                                     !!!
-SUBROUTINE ROOT_GLP
-! In a deleted neighborhood of a solution (1,X(SBAR)), the homotopy zero
-! curve (LAMBDA(S),X(S)) is assumed to safisfy X = X(LAMBDA), a consequence
-! of the Implicit Function Theorem and the fact that the Jacobian matrix
-! D RHO(A,LAMBDA(S),X(S))/DX is nonsingular in a sufficiently small
-! deleted neighborhood of an isolated solution.  Let
-!         TAU = 1 - LAMBDA = SIGMA**C,
-! where the positive integer C is the cycle number of the root.  Then
-!   X(LAMBDA) = X(1 - TAU) = X(1 - SIGMA**C) = Z(SIGMA)
-! is an analytic function of SIGMA in a neighborhood of SIGMA=0.  This fact
-! is exploited by guessing C and interpolating Z(SIGMA) within its
-! Maclaurin series' radius of convergence, but far enough away from 0 to
-! avoid numerical instability.  This annulus is called the "operating
-! range" of the algorithm.  The interpolant to analytic Z(SIGMA) is then
-! evaluated at SIGMA=0 to estimate the root X(1)=Z(0).
-
-! Local variables.
-IMPLICIT NONE
-INTEGER, PARAMETER:: CHAT_MAX=8, LITFH = 7
-INTEGER:: C, CHAT(1), CHAT_BEST, CHAT_OLD, GOING_BAD, I, & 
-  J, ML_ITER, N2P1, RETRY
-REAL (KIND=R8):: ACCURACY, FV(12), GM, H_SAVE, HC, HQ, HQ_BEST,    & 
-  HQMHC(CHAT_MAX), L(-3:2), S_SAVE, SIGMA(-3:2), SHRINK, T, TOL_1, &   
-  TOL_2, V(12) 
-LOGICAL:: EVEN, FIRST_JUMP, REUSE
-
-INTERFACE
-  FUNCTION DNRM2(N,X,STRIDE)
-    USE REAL_PRECISION
-    INTEGER:: N, STRIDE
-    REAL (KIND=R8):: DNRM2, X(N)
-  END FUNCTION DNRM2
-END INTERFACE
-
-N2P1 = 2*N + 1
-ACCURACY = MAX(FINALTOL,SQRT(EPSILON(1.0_R8))*10.0_R8**2)
-HQ_BEST = 10.0_R8*ACCURACY
-CHAT_BEST = 0 ; CHAT_OLD = 0 ; GOING_BAD = 0
-FIRST_JUMP = .TRUE. ; REUSE = .FALSE.
-YOLDS = 0.0_R8
-
-! Save the first point.
-H_SAVE = HOLD  
-S_SAVE = S - HOLD
-YS(:,1) = YOLD ; YS(:,2) = YPOLD
-
-! If Y(1) >= 1 or if YP(1) <= 0 back up to YOLD and generate another point.
-
-REFINE_Y: DO
-
-  IF ((Y(1) >= 1.0_R8) .OR. (YP(1) <= 0.0_R8)) THEN
-    SHRINK = 1.0_R8
-
-    ! Try 3 times to get a point.
-    DO I=1,3
-      SHRINK = SHRINK * .75_R8
-      S = S_SAVE
-      H = MIN(H_SAVE, SHRINK*(1.0_R8 - YS(1,1))/YS(1,2))
-
-      ! If Y(1)>=1 increase RELERR and ABSERR to prevent STEPNX from making
-      ! the stepsize too small.
-      IF (Y(1) >= 1.0_R8) THEN
-        RELERR = TRACKTOL ; ABSERR = TRACKTOL
-      END IF
-      Y = YS(:,1) ; YP = YS(:,2)
-      START = .TRUE.
-      CALL STEP_GLP
-      RELERR = FINALTOL ; ABSERR = FINALTOL
-      IF (IFLAG > 0) THEN
-        IFLAG = 4 ; RETURN
-      ELSE IF ((Y(1) < 1.0_R8) .AND. (YP(1) > 0.0_R8) .AND.  &
-              (Y(1) > YS(1,1))) THEN
-        ITER = ITER + 1
-        EXIT REFINE_Y
-      ELSE IF (I == 3) THEN 
-        IFLAG = 7 ; RETURN
-      END IF
-    END DO
-  ELSE
-
-    ! Refine the second point Y to FINALTOL accuracy.  If the refinement
-    ! fails, back up and get another point.
-    W = Y
-    RHOLEN = 0.0_R8
-    DO J=1,LITFH
-      CALL TANGENT_GLP(NEWTON_STEP=.TRUE.)
-      NNFE = NNFE + 1
-      IF (IFLAG > 0) THEN
-        IFLAG = -2
-        YP(1) = -1.0_R8 ; CYCLE REFINE_Y
-      END IF
-      W = W + TZ
-
-      ! Test for erratic LAMBDA.
-      IF (W(1) >= 1.0_R8 .OR. WP(1) <= 0.0_R8 .OR. W(1) <= YS(1,1)) THEN
-        YP(1) = -1.0_R8 ; CYCLE REFINE_Y 
-      END IF
-      IF (DNRM2(N2P1,TZ,1) <= FINALTOL * (DNRM2(N2P1,W,1) + 1.0_R8)) EXIT
-
-      ! Test for lack of convergence.
-      IF (J == LITFH) THEN
-        YP(1) = -1.0_R8 ; CYCLE REFINE_Y
-      END IF
-    END DO
-    Y = W ; YP = WP
-    S = S - HOLD
-    W = Y - YOLD
-    HOLD = DNRM2(N2P1,W,1)
-    S = S + HOLD
-    EXIT REFINE_Y
-  END IF
-
-END DO REFINE_Y
-
-! Save the second point.
-YS(:,3) = Y ; YS(:,4) = YP
-H_SAVE = H ; S_SAVE = S
-
-! Try entire end game interpolation process RETRY=10*NUMRR times.
-RETRY = 10*NUM_RERUNS
-
-MAIN_LOOP: &
-DO ML_ITER=1,RETRY
-
-  ! Get close enough to SIGMA=0 (LAMBDA=1) so that a Hermite cubic
-  ! interpolant is accurate to within TOL_1 (defined by CHAT).
-  OPERATING_RANGE: DO
-
-    ! Enforce LIMIT on the number of steps.
-    IF (ITER >= LIMIT) THEN
-      IFLAG = 3 ; EXIT MAIN_LOOP
-    END IF
-
-    SHRINK = 1.0_R8
-    DO J=1,3
-      SHRINK = .75_R8*SHRINK
-
-      ! Get a third point Y with Y(1) < 1.
-      H = MIN(H_SAVE, SHRINK*(1.0_R8 - Y(1))/YP(1))
-      CALL STEP_GLP
-      IF (IFLAG > 0) THEN
-        IFLAG = 4 ; EXIT MAIN_LOOP
-      ELSE IF ((Y(1) >= 1.0_R8) .OR. (YP(1) <= 0.0_R8) .OR.  &
-        (Y(1) <= YS(1,3))) THEN
-        ! Back up and try again with a smaller step.
-        Y = YS(:,3) ; YP = YS(:,4) ; YOLD = YS(:,1) ; YPOLD = YS(:,2)
-        S = S_SAVE
-      ELSE
-        ITER = ITER + 1
-        EXIT
-      END IF
-      IF (J == 3) THEN 
-        IFLAG = 7 ; EXIT MAIN_LOOP
-      END IF
-    END DO
-
-    ! Save the third point.
-    YS(:,5) = Y ; YS(:,6) = YP
-    H_SAVE = H ; S_SAVE = S
-
-    ! L(2) < L(1) < L(0) < 1.
-
-    L(2) = YS(1,1) ; L(1) = YS(1,3) ; L(0) = YS(1,5)
-
-    ! Test approximation quality for each cycle number C = 1,...,CHAT_MAX.
-
-    SHRINK = 1.0_R8/(1.0_R8 + MAXVAL(ABS(YS(2:N2P1,5))))
-    DO C=1,CHAT_MAX
-      SIGMA(0:2) = (1.0_R8 - L(0:2))**(1.0_R8/REAL(C,KIND=R8))
-
-      ! 0 < SIGMA(0) < SIGMA(1) < SIGMA(2).
-      ! Compute difference between Hermite quintic HQ(SIGMA) interpolating at
-      ! SIGMA(0:2) and Hermite cubic HC(SIGMA) interpolating at SIGMA(0:1).
-      ! The interpolation points for the Newton form are (SIGMA(0), SIGMA(0),
-      ! SIGMA(1), SIGMA(1), SIGMA(2), SIGMA(2)).  The function values are in
-      ! YS(:,5:1:-2) and the derivatives YS(:,6:2:-2) = dX/dS have to be
-      ! converted to dX/dSIGMA.
-
-      T = 0.0_R8
-      V(1:6) = (/ (SIGMA(J),SIGMA(J),J=0,2) /)
-      DO J=2,N2P1
-        FV(1:5:2) = YS(J,5:1:-2)
-        FV(2:6:2) = (YS(J,6:2:-2)/YS(1,6:2:-2)) * (-REAL(C,KIND=R8)) * &
-          SIGMA(0:2)**(C-1)
-        CALL INTERP(V(1:6),FV(1:6))
-        T = MAX(T,ABS(FV(5) - SIGMA(2)*FV(6)))
-      END DO
-
-      ! T*(SIGMA(1)*SIGMA(0))**2 = ||HQ(0) - HC(0)||_infty.
-
-      HQMHC(C) = T*((SIGMA(1)*SIGMA(0))**2)*SHRINK
-    END DO
-
-    ! Find best estimate CHAT of cycle number.
-    CHAT = MINLOC(HQMHC)
-
-    ! If there has been one successful jump across the origin (with
-    ! CHAT_BEST) and the cycle number prediction changes, then the process
-    ! may be leaving the operating range.
-
-    IF (( .NOT. FIRST_JUMP) .AND. (CHAT(1) /= CHAT_BEST)) THEN
-      GOING_BAD = GOING_BAD + 1
-      IF (GOING_BAD == 2) EXIT MAIN_LOOP
-    END IF
-    TOL_1 = ACCURACY*10.0_R8**(REAL(CHAT(1),KIND=R8)/2.0_R8)
-    IF (HQMHC(CHAT(1)) <= TOL_1) THEN
-      EXIT OPERATING_RANGE
-    ELSE IF ( .NOT. FIRST_JUMP) THEN
-      GOING_BAD = GOING_BAD + 1
-      IF (GOING_BAD == 2) EXIT MAIN_LOOP
-    END IF
-
-    ! Shift point history, and try to get closer to SIGMA=0.
-    YS(:,1:2) = YS(:,3:4) ; YS(:,3:4) = YS(:,5:6) ; REUSE = .FALSE.
-  END DO OPERATING_RANGE
-
-  ! Add 3 new points past SIGMA=0 such that
-  ! SIGMA(2) > SIGMA(1) > SIGMA(0) > 0 > SIGMA(-1) > SIGMA(-2) > SIGMA(-3).
-  ! If CHAT is odd then the corresponding LAMBDA are such that
-  !   L(2)   <   L(1)   <   L(0)   < 1 <   L(-1)   <   L(-2)   <   L(-3),
-  ! and if CHAT is even then
-  !   L(2)   <   L(1)   <   L(0)   < 1
-  !                                  1 >   L(-1)   >   L(-2)   >   L(-3).
-
-  SIGMA(0:2) = (1.0_R8 - L(0:2))**(1.0_R8/REAL(CHAT(1),KIND=R8))
-  DO I=1,3
-    V(1:4+2*I) = (/ (SIGMA(J),SIGMA(J),J=2,1-I,-1) /)
-    DO J=2,N2P1
-      FV(1:3+2*I:2) = YS(J,1:3+2*I:2)
-      FV(2:4+2*I:2) = (YS(J,2:4+2*I:2)/YS(1,2:4+2*I:2)) * &
-        (-REAL(CHAT(1),KIND=R8)) * SIGMA(2:1-I:-1)**(CHAT(1)-1)
-      CALL INTERP(V(1:4+2*I),FV(1:4+2*I))
-      CALL INTERP(V(1:4+2*I),FV(1:4+2*I),-SIGMA(I-1),W(J))
-    END DO
-    IF (MOD(CHAT(1),2) == 0) THEN
-      EVEN = .TRUE.
-      W(1) = L(I-1)
-    ELSE
-      EVEN = .FALSE.
-      W(1) = 2.0_R8 - L(I-1)
-    END IF
-
-    ! W now contains the (predicted) point symmetric to SIGMA(I-1) with
-    ! respect to SIGMA=0.
-    RHOLEN = 0.0_R8
-
-    ! Correct the prediction.  If there has been one successful jump across
-    ! the origin, correction failures may indicate that the process is
-    ! leaving the operating range.
-    DO J=1,LITFH
-      CALL TANGENT_GLP(NEWTON_STEP=.TRUE.)
-      NNFE = NNFE + 1
-
-      ! Test for singular Jacobian matrix.
-      IF (IFLAG > 0) EXIT MAIN_LOOP
-      W = W + TZ
-
-      ! Test for erratic LAMBDA.
-      IF ((( .NOT. EVEN) .AND. (W(1) <= 1.0_R8)) .OR.  &
-          (EVEN .AND. (W(1) >= 1.0_R8))) THEN
-        IF ( .NOT. FIRST_JUMP) THEN
-          GOING_BAD = GOING_BAD + 1
-          IF (GOING_BAD == 2) EXIT MAIN_LOOP
-        END IF  
-        YS(:,1:2) = YS (:,3:4) ; YS(:,3:4) = YS(:,5:6) 
-        REUSE = .FALSE. ; CYCLE MAIN_LOOP
-      END IF
-      IF (DNRM2(N2P1,TZ,1) <= FINALTOL * (DNRM2(N2P1,W,1) + 1.0_R8)) EXIT
-
-      ! Test for lack of convergence.
-      IF (J == LITFH) THEN
-        IF ( .NOT. FIRST_JUMP) THEN
-          GOING_BAD = GOING_BAD + 1
-          IF (GOING_BAD == 2) EXIT MAIN_LOOP
-        END IF
-        YS(:,1:2) = YS (:,3:4) ; YS(:,3:4) = YS(:,5:6)
-        REUSE = .FALSE. ; CYCLE MAIN_LOOP
-      END IF
-    END DO
-
-    ! Ensure that the tangent vector has the correct direction.
-    IF (EVEN) THEN
-      IF (WP(1) > 0.0_R8) WP = -WP
-    ELSE
-      IF (WP(1) < 0.0_R8) WP = -WP
-    END IF
-
-    ! Update the lambda (L), sigma (SIGMA), and history (YS) arrays.
-    L(-I) = W(1)
-    SIGMA(-I) =  -(ABS(L(-I) - 1.0_R8))**(1.0_R8/REAL(CHAT(1),KIND=R8))
-    YS(:,5+2*I) = W ; YS(:,6+2*I) = WP
-
-    ! Reuse old points if the cycle number estimation has not changed
-    ! from the last iteration, and the origin was successfully jumped in
-    ! the last iteration.
-    IF (REUSE .AND. (CHAT(1) == CHAT_OLD)) EXIT
-  END DO
-
-  ! Construct 12th order interpolant and estimate the root at SIGMA=0. 
-  HC = 0.0_R8 ; HQ = 0.0_R8 ; T = 0.0_R8
-  V(1:12) = (/ (SIGMA(J),SIGMA(J),J=-3,2) /)
-  DO J=2,N2P1
-    FV(1:11:2) = YS(J,11:1:-2)
-    FV(2:12:2) = (YS(J,12:2:-2)/YS(1,12:2:-2)) * &
-      (-REAL(CHAT(1),KIND=R8)) * SIGMA(-3:2)**(CHAT(1)-1)
-    CALL INTERP(V(1:12),FV(1:12))
-    CALL INTERP(V(1:12),FV(1:12),0.0_R8,W(J))
-
-    ! Difference between 8th and 6th order Hermite interpolants.
-    T  = MAX(T ,ABS(FV( 7) - SIGMA(0)*FV( 8)))
-
-    ! Difference between 10th and 8th order Hermite interpolants.
-    HC = MAX(HC,ABS(FV( 9) - SIGMA(1)*FV(10)))
-
-    ! Difference between 12th and 10th order Hermite interpolants.
-    HQ = MAX(HQ,ABS(FV(11) - SIGMA(2)*FV(12)))
-  END DO
-  SHRINK = 1.0_R8/(1.0_R8 + MAXVAL(ABS(W(2:N2P1))))
-  T  =  T*((PRODUCT(SIGMA(-3:-1)))**2)*SHRINK  ! ||H_7  - H_5||/(1+||W||)
-  HC = HC*((PRODUCT(SIGMA(-3: 0)))**2)*SHRINK  ! ||H_9  - H_7||/(1+||W||)
-  HQ = HQ*((PRODUCT(SIGMA(-3: 1)))**2)*SHRINK  ! ||H_11 - H_9||/(1+||W||)
-
-  ! Check both accuracy and consistency of Hermite interpolants.
-  TOL_2 = FINALTOL * (10**(CHAT(1) - 1))
-  GM = SQRT(TOL_1 * TOL_2)
-  IF ((T <= TOL_1) .AND. (HC <= GM) .AND. (HQ <= TOL_2)) THEN
-
-    ! Full convergence.
-    IF (FIRST_JUMP) FIRST_JUMP = .FALSE.
-    YOLDS(2:N2P1) = W(2:N2P1) ; HQ_BEST = HQ
-    CHAT_BEST = CHAT(1)
-    EXIT MAIN_LOOP
-  ELSE IF (HQ > 1.01_R8*HQ_BEST) THEN
-    IF ( .NOT. FIRST_JUMP) THEN
-      GOING_BAD = GOING_BAD + 1
-      IF (GOING_BAD == 2) EXIT MAIN_LOOP
-    END IF
-  ELSE
-
-    ! Progress has been made.
-    IF (FIRST_JUMP) FIRST_JUMP = .FALSE.
-    GOING_BAD = 0
-    YOLDS(2:N2P1) = W(2:N2P1) ; HQ_BEST = HQ
-    CHAT_BEST = CHAT(1)
-  END IF
-
-  ! Shift point history.
-  YS(:,1:2) = YS(:,3:4) ; YS(:,3:4) = YS(:,5:6)
-
-  ! If the cycle number estimate does not change in the next iteration, the
-  ! points found across the origin can be reused.
-  REUSE = .TRUE. ; CHAT_OLD = CHAT(1)
-  SIGMA(-3)   = SIGMA(-2)  ; SIGMA(-2)  = SIGMA(-1)
-  YS(:,11:12) = YS(:,9:10) ; YS(:,9:10) = YS(:,7:8)
-
-END DO MAIN_LOOP
-
-IF (ML_ITER >= RETRY) IFLAG = 7
-
-! Return final solution in Y.
-IF ( .NOT. FIRST_JUMP) THEN
-  Y(1) = HQ_BEST ; Y(2:N2P1) = YOLDS(2:N2P1)
-  IFLAG = 1 + 10*CHAT_BEST
-END IF
-RETURN
-END SUBROUTINE ROOT_GLP
-
-                                                                     !!!
-SUBROUTINE INTERP(T,FT,X,FX)
-! Given data points T(:) and function values FT(:)=f(T(:)), INTERP
-! computes the Newton form of the interpolating polynomial to f at T(:).
-! T is assumed to be sorted, and if
-! T(I-1) < T(I) = T(I+1) = ... = T(I+K) < T(I+K+1) then
-! FT(I)=f(T(I)), FT(I+1)=f'(T(I)), ..., FT(I+K)=f^{(K)}(T(I)).
-! On return FT(K) contains the divided difference f[T(1),...,T(K)], and
-! FX contains the interpolating polynomial evaluated at X.  If X and FX
-! are present, the divided differences are not calculated.
-
-IMPLICIT NONE
-REAL (KIND=R8), DIMENSION(:):: T, FT
-REAL (KIND=R8), OPTIONAL:: X, FX
-
-! Local variables.
-REAL (KIND=R8):: FOLD,SAVE
-INTEGER:: I,K,N
-
-N = SIZE(T)
-IF (.NOT. PRESENT(X)) THEN ! Calculate divided differences.
-  DO K=1,N-1
-    FOLD = FT(K)
-    DO I=K+1,N
-      IF (T(I) == T(I-K)) THEN
-        FT(I) = FT(I)/REAL(K,KIND=R8)
-      ELSE
-        SAVE = FT(I)
-        FT(I) = (FT(I) - FOLD)/(T(I) - T(I-K))
-        FOLD = SAVE
-      END IF
-    END DO
-  END DO
-  RETURN
-END IF
-FX = FT(N) ! Evaluate Newton polynomial.
-DO K=N-1,1,-1
-  FX = FX*(X - T(K)) + FT(K)
-END DO
-RETURN
-END SUBROUTINE INTERP
-
-                                                                     !!!
-SUBROUTINE RHO(LAMBDA,X)
-! RHO evaluates the (complex) homotopy map
-!
-!   RHO(A,LAMBDA,X) = LAMBDA*F(X) + (1 - LAMBDA)*GAMMA*G(X),
-!
-! where GAMMA is a random complex constant, and the Jacobian
-! matrix [ D RHO(A,LAMBDA,X)/D LAMBDA, D RHO(A,LAMBDA,X)/DX ] at
-! (A,LAMBDA,X), and updates the global arrays RHOV (the homotopy map),
-! DRHOX (the derivative of the homotopy with repect to X) , and DRHOL
-! (the derivative with respect to LAMBDA).  The vector A corresponds
-! mathematically to all the random coefficients in the start system, and
-! is not explicitly referenced by RHO.  X, on entry, is real, but since
-! arithmetic in RHO is complex, X is converted to complex form.  Before
-! return RHO converts the homotopy map and the two derivatives back to
-! real.  Precisely, suppose XC is the complexification of X, i.e.,
-!
-! XC(1:N)=CMPLX(X(1:2*N-1:2),X(2:2*N:2)).
-!
-! Let CRHOV(A,LAMBDA,XC) be the (complex) homotopy map.  Then RHOV
-! is just
-!
-! RHOV(1:2*N-1:2) = REAL( CRHOV(1:N)),
-! RHOV(2:2*N  :2) = AIMAG(CRHOV(1:N)).
-!
-! Let CDRHOXC = D CRHOV(A,LAMBDA,XC)/D XC denote the (complex) derivative
-! of the homotopy map with respect to XC, evaluated at (A,LAMBDA,XC).
-! DRHOX is obtained by
-!
-! DRHOX(2*I-1,2*J-1) = REAL(CDRHOXC(I,J)),
-! DRHOX(2*I  ,2*J  ) = DRHOX(2*I-1,2*J-1),
-! DRHOX(2*I  ,2*J-1) = AIMAG(CDRHOXC(I,J)),
-! DRHOX(2*I-1,2*J  ) = -DRHOX(2*I  ,2*J-1),
-!
-! for I, J = 1,...,N.  Let CDRHOL = D CRHOV(A,LAMBDA,XC)/D LAMBDA denote
-! the (complex) derivative of the homotopy map with respect to LAMBDA,
-! evaluated at (A,LAMBDA,XC).  Then DRHOL is obtained by
-!
-! DRHOL(1:2*N-1:2) = REAL( CDRHOL(1:N)),
-! DRHOL(2:2*N  :2) = AIMAG(CDRHOL(1:N)).
-!
-! (None of CRHOV, CDRHOXC, or CDRHOL are in the code.)
-!
-! Internal subroutines:  START_SYSTEM, TARGET_SYSTEM.
-! External (optional, user written) subroutine:  TARGET_SYSTEM_USER.
-!
-! On input:
-!
-! LAMBDA is the continuation parameter.
-!
-! X(1:2*N) is the real 2*N-dimensional evaluation point.
-!
-! On exit:
-!
-! LAMBDA and X are unchanged.
-!
-! RHOV(1:2*N) is the real (2*N)-dimensional representation of the
-!   homotopy map RHO(A,LAMBDA,X).
-!
-! DRHOX(1:2*N,1:2*N) is the real (2*N)-by-(2*N)-dimensional
-!   representation of D RHO(A,LAMBDA,X)/DX evaluated at (A,LAMBDA,X).
-!
-! DRHOL(1:2*N) is the real (2*N)-dimensional representation of
-!   D RHO(A,LAMBDA,X)/D LAMBDA evaluated at (A,LAMBDA,X).
-
-IMPLICIT NONE
-REAL (KIND=R8), INTENT(IN):: LAMBDA
-REAL (KIND=R8), DIMENSION(2*N), INTENT(IN):: X
-
-INTERFACE
-SUBROUTINE TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF)
-  USE REAL_PRECISION
-  INTEGER, INTENT(IN):: N
-  COMPLEX (KIND=R8), INTENT(IN), DIMENSION(N+1):: PROJ_COEF,XC
-  COMPLEX (KIND=R8), INTENT(OUT):: F(N), DF(N,N+1)
-END SUBROUTINE TARGET_SYSTEM_USER
-END INTERFACE
-
-! Local variables.
-INTEGER:: I, J
-REAL (KIND=R8):: ONEML
-COMPLEX (KIND=R8):: GAMMA
-
-ONEML = 1.0_R8 - LAMBDA
-GAMMA = (.0053292102547824_R8,.9793238462643383_R8)
-
-! Convert the real-valued evaluation point X to a complex vector.
-XC(1:N) = CMPLX(X(1:2*N-1:2),X(2:2*N:2),KIND=R8)
-
-! Calculate the homogeneous variable.
-XC(N+1) = SUM(PROJ_COEF(1:N)*XC(1:N)) + PROJ_COEF(N+1)
-
-CALL START_SYSTEM              ! Returns G and DG.
-IF (PRESENT(USER_F_DF)) THEN   ! Returns F and DF.
-  CALL TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF) ! User written subroutine.
-ELSE
-  CALL TARGET_SYSTEM ! Internal subroutine.
-END IF
-
-! Convert complex derivatives to real derivatives via the Cauchy-Riemann
-! equations.
-DO I=1,N
-  DO J=1,N  
-    DRHOX(2*I-1,2*J-1) = LAMBDA*REAL(DF(I,J)) + ONEML*REAL(DG(I,J)*GAMMA)
-    DRHOX(2*I  ,2*J  ) = DRHOX(2*I-1,2*J-1)
-    DRHOX(2*I  ,2*J-1) = LAMBDA*AIMAG(DF(I,J)) + ONEML*AIMAG(DG(I,J)*GAMMA)
-    DRHOX(2*I-1,2*J  ) = -DRHOX(2*I,2*J-1)
-  END DO
-END DO
-  DRHOL(1:2*N-1:2) = REAL(F) - REAL(G*GAMMA)
-  DRHOL(2:2*N:2  ) = AIMAG(F) - AIMAG(G*GAMMA) 
-  RHOV(1:2*N-1:2)  = LAMBDA*REAL(F) + ONEML*REAL(G*GAMMA)
-  RHOV(2:2*N:2  )  = LAMBDA*AIMAG(F) + ONEML*AIMAG(G*GAMMA)
-RETURN
-END SUBROUTINE RHO
-
-                                                                     !!!
-SUBROUTINE START_SYSTEM
-! START_SYSTEM evaluates the start system G(XC) and the Jacobian matrix
-!   DG(XC).  Arithmetic is complex.
-!
-! On exit:
-!
-! G(:) contains the complex N-dimensional start system evaluated at XC(:).
-!
-! DG(:,:) contains the complex N-by-N-dimensional Jacobian matrix of
-!   the start system evaluted at XC(:). 
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: I, J, K, L
-COMPLEX (KIND=R8):: TEMP
-COMPLEX (KIND=R8), DIMENSION(N):: TEMP2
-
-! TEMP1G AND TEMP2G are employed to reduce recalculation in G and DG.
-! Note:  If SD(I,J)=0, then the corresponding factor is 1, not 0.
-TEMP1G = (0.0_R8,0.0_R8)
-TEMP2G = (0.0_R8,0.0_R8)
-DO I=1,N
-  DO J=1,COVER_SIZES(I)
-    IF (COVER(I)%SET(J)%SET_DEG == 0) THEN
-      TEMP2G(I,J) = (1.0_R8,0.0_R8)
-    ELSE
-      K = COVER(I)%SET(J)%NUM_INDICES
-      TEMP1G(I,J) = SUM( COVER(I)%SET(J)%START_COEF(1:K)*  &
-                         XC(COVER(I)%SET(J)%INDEX(1:K)) )
-      TEMP2G(I,J) = TEMP1G(I,J)**COVER(I)%SET(J)%SET_DEG - &
-                        XC(N+1)**COVER(I)%SET(J)%SET_DEG
-    END IF
-  END DO
-  G(I) = PRODUCT(TEMP2G(I,1:COVER_SIZES(I)))
-END DO
-
-! Calculate the derivative of G with respect to XC(1),...,XC(N)
-!   in 3 steps.
-! STEP 1:  First treat XC(N+1) as an independent variable. 
-
-DG = (0.0_R8,0.0_R8)  
-DO I=1,N
-  DO J=1,COVER_SIZES(I)
-    IF (COVER(I)%SET(J)%SET_DEG == 0) CYCLE
-    K = COVER(I)%SET(J)%NUM_INDICES
-    TEMP2(1:K) = COVER(I)%SET(J)%SET_DEG * &
-      COVER(I)%SET(J)%START_COEF(1:K) * &
-      (TEMP1G(I,J)**(COVER(I)%SET(J)%SET_DEG - 1))
-    TEMP = (1.0_R8,0.0_R8)
-    DO L=1,COVER_SIZES(I)
-      IF (L == J) CYCLE
-      TEMP = TEMP * TEMP2G(I,L)
-    END DO
-
-    DG(I,COVER(I)%SET(J)%INDEX(1:K)) = &
-      DG(I,COVER(I)%SET(J)%INDEX(1:K)) + TEMP2(1:K) * TEMP
-  END DO
-END DO
-
-! STEP 2:  Now calculate the N-by-1 Jacobian matrix of G with
-!   respect to XC(N+1) using the product rule.
-
-DO I=1,N
-  DO J=1,COVER_SIZES(I)
-    IF (COVER(I)%SET(J)%SET_DEG == 0) CYCLE            
-    TEMP = -COVER(I)%SET(J)%SET_DEG * &
-      (XC(N+1)**(COVER(I)%SET(J)%SET_DEG - 1))
-    DO K=1,COVER_SIZES(I)
-      IF (K == J) CYCLE
-      TEMP = TEMP*TEMP2G(I,K)
-    END DO
-    DG(I,N+1) = DG(I,N+1) + TEMP
-  END DO
-END DO
-
-! STEP 3:  Use the chain rule with XC(N+1) considered as a function
-!   of XC(1),...,XC(N).
-
-DO I=1,N
-  DG(I,1:N) = DG(I,1:N) + DG(I,N+1) * PROJ_COEF(1:N)
-END DO
-RETURN
-END SUBROUTINE START_SYSTEM
-
-                                                                     !!!
-SUBROUTINE TARGET_SYSTEM
-! TARGET_SYSTEM calculates the target system F(XC) and the Jacobian matrix
-!   DF(XC).  Arithmetic is complex.
-!
-! On exit:
-!
-! F(:) contains the complex N-dimensional target system evaluated
-!   at XC(:).
-!
-! DF(:,:) is the complex N-by-N-dimensional Jacobian matrix of the
-!   target system evaluated at XC(:).
-
-! Local variables.
-IMPLICIT NONE
-INTEGER:: I, J, K, L
-COMPLEX (KIND=R8):: T, TS
-
-! Evaluate F(XC).  For efficiency, indexing functions and array sections
-! are avoided.
-DO I=1,N
-  TS = (0.0_R8, 0.0_R8)
-  DO J=1,POLYNOMIAL(I)%NUM_TERMS
-    T = POLYNOMIAL(I)%TERM(J)%COEF
-    DO K=1,N+1
-      IF (POLYNOMIAL(I)%TERM(J)%DEG(K) == 0) CYCLE
-      T = T * XC(K)**POLYNOMIAL(I)%TERM(J)%DEG(K)
-    END DO
-    TS = TS + T
-  END DO
-  F(I) = TS
-END DO 
-
-! Calulate the Jacobian matrix DF(XC).
-DF = (0.0_R8,0.0_R8)
-DO I=1,N
-  DO J=1,N+1
-    TS = (0.0_R8,0.0_R8)
-    DO K=1,POLYNOMIAL(I)%NUM_TERMS
-      IF (POLYNOMIAL(I)%TERM(K)%DEG(J) == 0) CYCLE
-      T = POLYNOMIAL(I)%TERM(K)%COEF * POLYNOMIAL(I)%TERM(K)%DEG(J) * &
-          (XC(J)**(POLYNOMIAL(I)%TERM(K)%DEG(J) - 1))
-      DO L=1,N+1
-        IF ((L == J) .OR. (POLYNOMIAL(I)%TERM(K)%DEG(L) == 0)) CYCLE
-        T = T * (XC(L)**POLYNOMIAL(I)%TERM(K)%DEG(L))
-      END DO
-      TS = TS + T
-    END DO
-    DF(I,J) = TS
-  END DO
-END DO
-
-! Convert DF to partials with respect to XC(1),...,XC(N) by
-!   applying the chain rule with XC(N+1) considered as a function
-!   of XC(1),...,XC(N).
-DO I=1,N
-  DF(I,1:N) = DF(I,1:N) + PROJ_COEF(1:N) * DF(I,N+1)
-END DO
-RETURN
-END SUBROUTINE TARGET_SYSTEM
-
-                                                                     !!!
-SUBROUTINE OUTPUT_GLP
-! OUTPUT_GLP first untransforms (converts from projective to affine
-! coordinates) and then unscales a root.
-!
-! On entry:
-!
-! XC(1:N) contains a root in projective coordinates, with the (N+1)st
-!   projective coordinate XC(N+1) implicitly defined by the
-!   projective transformation.
-!
-! On exit:
-!
-! XC(1:N) contains the untransformed (affine), unscaled root.
-!
-! XC(N+1) is the homogeneous coordinate of the root of the scaled
-!   target system, if scaling was performed. 
-
-IMPLICIT NONE
-INTEGER:: I
-REAL (KIND=R8), PARAMETER:: BIG=HUGE(1.0_R8)
-
-! Calculate the homogeneous coordinate XC(N+1) using the vector XC(1:N)
-! with the projective transformation, then untransform XC(1:N) (convert
-! to affine coordinates).
-XC(N+1) = SUM(PROJ_COEF(1:N)*XC(1:N)) + PROJ_COEF(N+1)
-
-! Deal carefully with solutions at infinity.
-IF (ABS(XC(N+1)) < 1.0_R8) THEN
-  DO I=1,N
-    IF (ABS(XC(I)) >= BIG*ABS(XC(N+1))) THEN
-      XC(I) = CMPLX(BIG,BIG,KIND=R8)  ! Solution at infinity.
-    ELSE
-      XC(I) = XC(I)/XC(N+1)
-    END IF
-  END DO
-ELSE
-  XC(1:N) = XC(1:N)/XC(N+1)
-END IF
-
-! Unscale the variables.
-IF (.NOT. PRESENT(NO_SCALING)) THEN
-  DO I=1,N
-    IF (REAL(XC(I)) /= BIG) XC(I) = XC(I)*(10.0_R8**SCALE_FACTORS(I))
-  END DO
-END IF
-
-RETURN
-END SUBROUTINE OUTPUT_GLP
-END SUBROUTINE POLSYS_GLP
-
-                                                                     !!!
-SUBROUTINE CHECK_GLP(N, VALID_FLAG, POL_INDEX, TERM_INDEX)
-! CHECK_GLP checks that the monomials of the target system are in the span
-!   of the set structure specified for the start system. 
-! For each monomial of each target polynomial: 
-! 1. Form the array FLAG_MTX with the degree of the monomial as NUM_ROWS,
-!    and the degree of the set structure as NUM_COLS. 
-! 2. Initialize FLAG_MTX so that an element is 1 if the variable is present 
-!      in the set and 0 otherwise.
-! 3. Scan FLAG_MTX to determine whether a valid assignment exists.  
-!
-! On entry:
-! N: dimension of polynomial system.
-!
-! On exit:
-! VALID_FLAG
-!    = 0   for a normal return.
-!    = -1  if a monomial is not in the specified set structure.
-!    = -2  if the total degree of a term is greater than the total degree 
-!          of the set structure.
-!    = -3  if a variable is not in the set structure.
-!
-! POL_INDEX provides, when VALID_FLAG<0, the polynomial index of the monomial 
-!   that is not in the specified GLP set structure. 
-!
-! TERM_INDEX provides, when VALID_FLAG<0, the term index of the monomial
-!   that is not in the specified GLP set structure.
-
-
-USE GLOBAL_GLP
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-INTEGER, INTENT(OUT):: VALID_FLAG
-INTEGER, INTENT(OUT):: POL_INDEX,TERM_INDEX
-
-! Local variables.
-INTEGER:: COLS, FLAG, I, J, K, L, MAX_TOT_DEG, NUM_COLS, NUM_ROWS, ROWS
-INTEGER, DIMENSION(N):: TOT_DEG
-
-! FLAG_MTX(I,J) = 1 if the variable corresponding to row I is present in
-! the set corresponding to column J, and 0 otherwise.
-INTEGER, DIMENSION(:,:), ALLOCATABLE:: FLAG_MTX
-! COL_TAKEN(I) = 1 if the Ith column is occupied and 0 otherwise.
-INTEGER, DIMENSION(:), ALLOCATABLE:: COL_TAKEN
-! LEX_NUM(I) is the column index that the Ith row is scanning.
-INTEGER, DIMENSION(:), ALLOCATABLE:: LEX_NUM
-
-DO I=1,N
-  TOT_DEG(I) = SUM( (/ (SD(I,J),J=1,COVER_SIZES(I)) /) )
-END DO
-MAX_TOT_DEG = MAXVAL(TOT_DEG(1:N))
-
-ALLOCATE(FLAG_MTX(MAX_TOT_DEG, MAX_TOT_DEG))
-ALLOCATE(LEX_NUM(MAX_TOT_DEG))
-ALLOCATE(COL_TAKEN(MAX_TOT_DEG))
-
-FLAG_MTX = 0
-
-POL_LOOP: DO POL_INDEX=1,N
-  NUM_COLS = TOT_DEG(POL_INDEX)
-  TERM_LOOP: DO TERM_INDEX=1, NUMT(POL_INDEX)    
-    VALID_FLAG = 0 ! Valid.
-    I = POL_INDEX ! I is the short name of POL_INDEX.
-    L = TERM_INDEX ! L is the short name of TERM_INDEX.
-    NUM_ROWS = SUM( (/(D(I,L,K),K=1,N)/) )
-    IF (NUM_ROWS ==0 ) CYCLE TERM_LOOP
-    IF (NUM_ROWS > NUM_COLS ) THEN
-      VALID_FLAG = -2 ! The total degree is too high.
-      EXIT POL_LOOP 
-    END IF
-
-    ! Set flag matrix.
-    ROWS = 1
-    DO K=1,N
-      IF (D(I, L, K)==0) CYCLE
-      COLS = 1
-      DO J=1, COVER_SIZES(I)
-        IF (SD(I,J) ==0) CYCLE
-        FLAG = 0
-        IF (ANY(COVER(I)%SET(J)%INDEX(1:NUMV(I,J)) == K )) FLAG = 1
-        FLAG_MTX( ROWS:ROWS+D(I,L,K)-1, COLS:COLS+SD(I,J)-1) = FLAG
-        COLS = COLS + SD(I,J)
-      END DO
-      ROWS = ROWS + D(I,L,K)
-    END DO
-
-    ! If all the elements in a row are all zero, a variable is present in
-    ! the term that is not in any set in the cover.
-    DO K=1,NUM_ROWS
-      IF (ALL(FLAG_MTX(K,1:NUM_COLS) == 0 )) THEN
-        VALID_FLAG = -3
-        EXIT POL_LOOP
-      END IF
-    END DO
- 
-    CALL CHECK_ONE_TERM
-    IF (VALID_FLAG < 0) EXIT POL_LOOP ! Invalid set covering.
-  END DO TERM_LOOP
-END DO POL_LOOP
-
-DEALLOCATE(LEX_NUM,COL_TAKEN,FLAG_MTX)
-RETURN
-
-CONTAINS
-
-SUBROUTINE CHECK_ONE_TERM()
-! CHECK_ONE_TERM scans FLAG_MTX and attempts to construct the array LEX_NUM 
-! of column indices of FLAG_MTX such that
-!   FLAG_MTX(I,LEX_NUM(I)) = 1  for each I=1,...,NUM_ROWS,
-! and all the elements of LEX_NUM are distinct.  Success means that the
-! given term is in the span of the polynomials defined by the component
-! set covering.
-!
-! On entry:
-! FLAG_MTX(1:NUM_ROWS,1:NUM_COLS) is a matrix with entries that are 1 or 0.
-!
-! On exit:
-! VALID_FLAG 
-!    =  0  if a valid array LEX_NUM exists.
-!    = -1  otherwise.
-
-IMPLICIT NONE
-INTEGER:: II, JJ, KK, LL 
-
-LEX_NUM = 0
-COL_TAKEN = 0
-KK = 1
-
-CHECK_LOOP: DO
-  IF (KK==0) THEN
-    VALID_FLAG = -1 ! Set covering is invalid.
-    RETURN 
-  END IF
-  DO II=KK,NUM_ROWS
-    JJ = 0
-    DO LL=LEX_NUM(II)+1,NUM_COLS
-      IF ((FLAG_MTX(II,LL)==1) .AND. (COL_TAKEN(LL)==0)) THEN
-        JJ = LL
-        EXIT
-      END IF
-    END DO
-    IF ( JJ==0 )  THEN
-      LEX_NUM(II:NUM_ROWS) = 0
-        DO LL=II-1, NUM_ROWS
-          IF (LL > 0 .AND. LEX_NUM(LL) > 0) COL_TAKEN(LEX_NUM(LL)) = 0
-        END DO
-      KK = II-1
-      CYCLE CHECK_LOOP
-    END IF
-    COL_TAKEN(JJ) = 1
-    LEX_NUM(II) = JJ
-  END DO
-  RETURN ! Set covering is valid (for this term).
-END DO CHECK_LOOP
-END SUBROUTINE CHECK_ONE_TERM
-END SUBROUTINE CHECK_GLP
-
-                                                                     !!!
-SUBROUTINE BEZOUT_GLP(N,MAXT,TOL,BGLP,  POL_INDEX,TERM_INDEX)
-!
-! BEZOUT_GLP calculates and returns only the generalized Bezout number
-! BGLP of the target polynomial system, based on the variable covering
-! P defined in the module GLOBAL_GLP.  BEZOUT_GLP finds BGLP very
-! quickly, which is useful for exploring alternative coverings.
-!
-! Calls SINGSYS_GLP.
-! 
-! On input:
-!
-! N is the dimension of the target system.
-!
-! MAXT is the maximum number of terms in any component of the target
-!   system.  MAXT = MAX((/(NUMT(I),I=1,N)/)).
-!
-! TOL is the singularity test threshold used by SINGSYS_GLP.  If
-!   TOL <= 0.0 on input, TOL is reset to the default value
-!   SQRT(EPSILON(1.0_R8)).
-!
-! GLOBAL_GLP allocatable objects POLYNOMIAL, COVER_SIZES, and
-!   COVER (see GLOBAL_GLP documentation) must be allocated and
-!   defined in the calling program.
-!
-! On output:
-!
-! N and MAXT are unchanged, and TOL may have been changed as described
-!   above.
-!
-! BGLP is the generalized Bezout number for the target system based on
-!   the variable covering P defined in the module GLOBAL_GLP.  BGLP = -1
-!   indicates that the provided system covering P is inconsistent
-!   with the given target polynomial system.
-!
-! POL_INDEX, TERM_INDEX are optional variables that give the polynomial
-!   index and term index, respectively, of the target system monomial that
-!   is inconsistent with the given system set covering.  These are useful
-!   for debugging an incorrect input system covering.
-
-USE GLOBAL_GLP
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N, MAXT
-REAL (KIND=R8), INTENT(IN OUT):: TOL
-INTEGER, INTENT(OUT):: BGLP
-INTEGER, OPTIONAL:: POL_INDEX, TERM_INDEX
-
-!INTERFACE
-!  SUBROUTINE CHECK_GLP(N, VALID_FLAG, POL_INDEX, TERM_INDEX)
-!  USE GLOBAL_GLP
-!  INTEGER, INTENT(IN):: N
-!  INTEGER, INTENT(OUT):: VALID_FLAG
-!  INTEGER, INTENT(OUT):: POL_INDEX,TERM_INDEX
-!  END SUBROUTINE CHECK_GLP
-!  SUBROUTINE SINGSYS_GLP(N,LEX_NUM,LEX_SAVE,TOL,RAND_MAT,MAT,NONSING)
-!  USE GLOBAL_GLP
-!  INTEGER, INTENT(IN):: N
-!  INTEGER, DIMENSION(N), INTENT(IN OUT):: LEX_NUM,LEX_SAVE
-!  REAL (KIND=R8), INTENT(IN):: TOL
-!  REAL (KIND=R8), DIMENSION(N,N), INTENT(IN):: RAND_MAT
-!  REAL (KIND=R8), DIMENSION(N+1,N), INTENT(IN OUT):: MAT
-!  LOGICAL, INTENT(OUT):: NONSING
-!  END SUBROUTINE SINGSYS_GLP
-!END INTERFACE
-
-! Local variables.
-INTEGER:: J, K, L, POL_IND, TERM_IND, VALID_GLP
-INTEGER, DIMENSION(MAXT):: DHOLD
-INTEGER, DIMENSION(N):: LEX_NUM, LEX_SAVE
-REAL (KIND=R8), DIMENSION(N+1,N):: MAT
-REAL (KIND=R8), DIMENSION(N,N):: RAND_MAT
-REAL, DIMENSION(N,N):: RANDNUMS
-LOGICAL:: NONSING
-
-! Set default value for singularity threshold TOL.
-IF (TOL <= REAL(N,KIND=R8)*EPSILON(1.0_R8)) TOL = SQRT(EPSILON(1.0_R8))
-
-! Initialize RAND_MAT with random numbers uniformly distributed in
-! [-1,-1/2] union [1/2,1].
-CALL RANDOM_SEED
-CALL RANDOM_NUMBER(HARVEST=RANDNUMS)
-RANDNUMS = RANDNUMS - 0.5 + SIGN(0.5, RANDNUMS - 0.5)
-RAND_MAT = REAL(RANDNUMS,KIND=R8)
-
-! GLP does not calculate set degrees, these must be provided as input.
-
-! Check that the system set covering is valid.
-CALL CHECK_GLP(N, VALID_GLP, POL_IND, TERM_IND)
-IF (VALID_GLP < 0)  THEN
-  BGLP = -1
-  IF (PRESENT(POL_INDEX)) POL_INDEX = POL_IND
-  IF (PRESENT(TERM_INDEX)) TERM_INDEX = TERM_IND
-  RETURN
-END IF
-
-! Compute Bezout number using lexicographic ordering.
-BGLP = 0
-LEX_NUM(1:N-1) = 1
-LEX_NUM(N) = 0
-LEX_SAVE = 0
-
-MAIN_LOOP: DO 
-  DO J=N,1,-1
-    IF (LEX_NUM(J) < COVER_SIZES(J)) THEN
-      L = J
-      EXIT
-    END IF
-  END DO
-  LEX_NUM(L) = LEX_NUM(L) + 1
-  IF (L + 1 <= N) LEX_NUM(L+1:N) = 1
-
-  ! Test singularity of start subsystem corresponding to lexicographic
-  ! vector LEX_NUM.
-  CALL SINGSYS_GLP(N,LEX_NUM,LEX_SAVE,TOL,RAND_MAT,MAT,NONSING)
-  IF (NONSING) THEN
-    BGLP = BGLP + PRODUCT((/(SD(K,LEX_NUM(K)),K=1,N)/))
-  END IF
-  IF (ALL(LEX_NUM == COVER_SIZES)) EXIT
-END DO MAIN_LOOP
-RETURN
-END SUBROUTINE BEZOUT_GLP
-
-                                                                     !!!
-SUBROUTINE SINGSYS_GLP(N,LEX_NUM,LEX_SAVE,TOL,RAND_MAT,MAT,NONSING)
-!
-! SINGSYS_GLP determines if the subsystem of the start system
-! corresponding to the lexicographic vector LEX_NUM is nonsingular,
-! or if a family of subsystems of the start system defined by
-! LEX_NUM and LEX_SAVE is singular, by using Householder reflections and
-! tree pruning.  Using the notation defined in the module GLOBAL_GLP,
-! the vector LEX_NUM defines a linear system of equations
-!     L(1,LEX_NUM(1)) = constant_1
-!                     .
-!                     .
-!                     .
-!     L(N,LEX_NUM(N)) = constant_N
-! which, if nonsingular for generic coefficients, defines
-! PRODUCT((/ (SD(K,LEX_NUM(K)), K=1,N) /)) nonsingular starting points
-! for homotopy paths.  Nonsingularity of a generic coefficient matrix is
-! checked by computing a QR decomposition of the transpose of the
-! coefficient matrix.  Observe that if the first J rows are rank
-! deficient, then all lexicographic vectors (LEX_NUM(1:J), *) also
-! correspond to singular systems, and thus the tree of all possible
-! lexicographic orderings can be pruned.
-!
-! The QR factorization is maintained as a product of Householder
-! reflections, and updated based on the difference between LEX_SAVE
-! (the value of LEX_NUM returned from the previous call to SINGSYS_GLP)
-! and the current input LEX_NUM.  LEX_SAVE and LEX_NUM together
-! implicitly define a family of subsystems, namely, all those
-! corresponding to lexicographic orderings with head LEX_NUM(1:J),
-! where J is the smallest index such that LEX_SAVE(J) /= LEX_NUM(J).
-!
-! Calls LAPACK subroutines DLARFX and DLARFG.
-!
-! On input:
-!
-! N is the dimension of the start and target systems.
-!
-! LEX_NUM(1:N) is a lexicographic vector which specifies a particular
-!   subsystem (and with LEX_SAVE a family of subsystems) of the start
-!   system.
-!
-! LEX_SAVE(1:N) holds the value of LEX_NUM returned from the previous
-!   call, and should not be changed between calls to SINGSYS_GLP.  Set
-!   LEX_SAVE=0 on the first call to SINGSYS_GLP.
-!
-! TOL is the singularity test threshold.  The family of subsystems
-!   corresponding to lexicographic vectors (LEX_NUM(1:J), *) is declared
-!   singular if ABS(R(J,J)) < TOL for the QR factorization of a generic
-!   start system coefficient matrix.
-!
-! RAND_MAT(N,N) is a random matrix with entries uniformly distributed
-!   in [-1,-1/2] union [1/2,1], used to seed the random generic
-!   coefficient matrix MAT.  RAND_MAT should not change between calls to
-!   SINGSYS_GLP.
-!
-! On output:
-!
-! LEX_NUM is unchanged if NONSING=.TRUE.  If NONSING=.FALSE.,
-!   LEX_NUM(1:J) is unchanged, and
-!   LEX_NUM(J+1:N) = COVER_SIZES(J+1:N), where J is the smallest
-!   index such that ABS(R(J,J)) < TOL for the QR factorization of the
-!   generic start system coefficient matrix corresponding to LEX_NUM
-!   (on input).
-!
-! LEX_SAVE = LEX_NUM.
-!
-! NONSING = .TRUE. if the subsystem of the start system defined by
-!   LEX_NUM is nonsingular.  NONSING = .FALSE. otherwise, which means that
-!   the entire family of subsystems corresponding to lexicographic vectors
-!   (LEX_NUM(1:J), *) is singular, where J is the smallest index such that
-!   ABS(R(J,J)) < TOL for the QR factorization of the generic start system
-!   coefficient matrix corresponding to LEX_NUM (on input).
-!
-! Working storage:
-!
-! MAT(N+1,N) is updated on successive calls to SINGSYS_GLP, and should
-! not be changed by the calling program.  MAT can be undefined on the
-! first call to SINGSYS_GLP (when LEX_SAVE = 0).  Define J as the
-! smallest index where LEX_SAVE(J) /= LEX_NUM(J).  Upon exit after a
-! subsequent call, for some M >= J, MAT contains, in the first M columns,
-! a partial QR factorization stored as a product of Householder
-! reflections, and, in the last N-M columns, random numbers that define
-! the subsystem of the start system corresponding to the lexicographic
-! vector LEX_NUM.  For 1<=K<=M, V(2:N+1-K)=MAT(K+1:N,K), V(1)=1, together
-! with TAU=MAT(N+1,K), define a Householder reflection of dimension
-! N+1-K.
-
-USE GLOBAL_GLP
-
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-INTEGER, DIMENSION(N), INTENT(IN OUT):: LEX_NUM, LEX_SAVE
-REAL (KIND=R8), INTENT(IN):: TOL
-REAL (KIND=R8), DIMENSION(N,N), INTENT(IN):: RAND_MAT
-REAL (KIND=R8), DIMENSION(N+1,N), INTENT(IN OUT):: MAT
-LOGICAL, INTENT(OUT):: NONSING
-
-! Local variables.
-INTEGER:: I, J, K
-REAL (KIND=R8), DIMENSION(N):: V
-REAL (KIND=R8):: WORK(1)
-
-IF (N == 1) THEN
-  LEX_SAVE = LEX_NUM
-  NONSING = .TRUE.
-  RETURN
-END IF
-
-! (Re)set MAT (in column form) from LEX_NUM.
-DO I=1,N
-  IF (LEX_SAVE(I) /= LEX_NUM(I)) THEN
-    LEX_SAVE(I+1:N) = 0
-    DO K=I,N
-      MAT(1:N+1,K) = 0.0_R8
-      DO J=1,NUMV(K,LEX_NUM(K))
-        MAT(PAR(K,LEX_NUM(K),J),K) = RAND_MAT(PAR(K,LEX_NUM(K),J),K)
-      END DO
-    END DO
-    EXIT
-  END IF
-END DO
-
-! Recompute QR factorization of MAT starting where first change in
-! LEX_NUM occurred.
-NONSING = .FALSE.
-IF (LEX_SAVE(1) /= LEX_NUM(1)) THEN
-  ! Skip QR factorization and prune tree if this set degree = 0.
-  IF (SD(1,LEX_NUM(1)) == 0) THEN
-    LEX_NUM(2:N) = COVER_SIZES(2:N)
-    LEX_SAVE = LEX_NUM
-    RETURN
-  ELSE
-    CALL DLARFG(N,MAT(1,1),MAT(2:N,1),1,MAT(N+1,1))
-  END IF
-END IF
-DO J=2,N
-  IF (LEX_SAVE(J) /= LEX_NUM(J)) THEN
-
-    ! Skip rest of QR factorization and prune tree if this set degree = 0.
-    IF (SD(J,LEX_NUM(J)) == 0) THEN
-      IF (J < N) LEX_NUM(J+1:N) = COVER_SIZES(J+1:N)
-      EXIT
-    END IF
-    DO K=1,J-1
-      V(K) = 1.0_R8
-      V(K+1:N) = MAT(K+1:N,K)
-      CALL DLARFX('L',N-K+1,1,V(K:N),MAT(N+1,K),MAT(K:N,J),N-K+1,WORK)
-    END DO
-    IF (J < N) CALL DLARFG(N-J+1,MAT(J,J),MAT(J+1:N,J),1,MAT(N+1,J))
-
-    ! Check singularity of subsystem corresponding to lexicographic
-    ! vector (LEX_NUM(1:J), *).
-    IF (ABS(MAT(J,J)) < TOL) THEN
-      IF (J < N) LEX_NUM(J+1:N) = COVER_SIZES(J+1:N)
-      EXIT
-    END IF
-  END IF
-
-  ! Subsystem corresponding to LEX_NUM is nonsingular when J==N here.
-  IF (J == N) NONSING = .TRUE.
-END DO
-
-! Save updated LEX_NUM for next call.
-LEX_SAVE = LEX_NUM
-RETURN
-END SUBROUTINE SINGSYS_GLP
-
-END MODULE POLSYS2
-                                                                     !!!
-
-
-! ----------------------------------------------------------------------
-!
-! The following modules and external subroutines are from HOMPACK90.
-
-
-!  This module provides global allocatable arrays used for the sparse
-!  matrix data structures, and by the polynomial system solver.  The
-!  MODULE HOMOTOPY uses this module.
-!
-      MODULE HOMPACK90_GLOBAL
-      USE REAL_PRECISION
-      INTEGER, DIMENSION(:), ALLOCATABLE:: COLPOS, IPAR, ROWPOS
-      REAL (KIND=R8), DIMENSION(:), ALLOCATABLE:: PAR, PP, QRSPARSE
-      END MODULE HOMPACK90_GLOBAL
-
-
-      MODULE HOMOTOPY       ! Interfaces for user written subroutines.
-      USE REAL_PRECISION, ONLY : R8
-      USE HOMPACK90_GLOBAL
-!
-! Interface for subroutine that evaluates F(X) and returns it in the vector V.
-      INTERFACE
-         SUBROUTINE F(X,V)
-         USE REAL_PRECISION
-         REAL (KIND=R8), DIMENSION(:), INTENT(IN):: X
-         REAL (KIND=R8), DIMENSION(:), INTENT(OUT):: V
-         END SUBROUTINE F
-      END INTERFACE
-!
-! Interface for subroutine that returns in V the K-th column of the Jacobian 
-! matrix of F(X) evaluated at X. 
-      INTERFACE
-         SUBROUTINE FJAC(X,V,K)
-         USE REAL_PRECISION
-         REAL (KIND=R8), DIMENSION(:), INTENT(IN):: X
-         REAL (KIND=R8), DIMENSION(:), INTENT(OUT):: V
-         INTEGER, INTENT(IN):: K
-         END SUBROUTINE FJAC
-      END INTERFACE
-!
-! Interface for subroutine that evaluates RHO(A,LAMBDA,X) and returns it 
-! in the vector V.
-      INTERFACE
-         SUBROUTINE RHO(A,LAMBDA,X,V)
-         USE REAL_PRECISION
-         REAL (KIND=R8), INTENT(IN):: A(:),X(:)
-         REAL (KIND=R8), INTENT(IN OUT):: LAMBDA
-         REAL (KIND=R8), INTENT(OUT):: V(:)
-         END SUBROUTINE RHO
-      END INTERFACE
-! The following code is specifically for the polynomial system driver
-! POLSYS1H, and should be used verbatim with POLSYS1H in the external 
-! subroutine RHO.  
-!     USE HOMPACK90_GLOBAL, ONLY: IPAR, PAR  ! FOR POLSYS1H ONLY.
-!     INTERFACE
-!       SUBROUTINE HFUNP(N,A,LAMBDA,X)
-!       USE REAL_PRECISION
-!       INTEGER, INTENT(IN):: N
-!       REAL (KIND=R8), INTENT(IN):: A(2*N),LAMBDA,X(2*N)
-!       END SUBROUTINE HFUNP
-!     END INTERFACE
-!     INTEGER:: J,NPOL
-! FORCE PREDICTED POINT TO HAVE  LAMBDA .GE. 0  .
-!     IF (LAMBDA .LT. 0.0) LAMBDA=0.0
-!     NPOL=IPAR(1)
-!     CALL HFUNP(NPOL,A,LAMBDA,X)
-!     DO J=1,2*NPOL
-!       V(J)=PAR(IPAR(3 + (4-1)) + (J-1))
-!     END DO
-!     RETURN
-! If calling FIXP?? or STEP?? directly, supply appropriate replacement
-! code in the external subroutine RHO.
-!
-! Interface for subroutine that calculates and returns in A the vector
-! Z such that RHO(Z,LAMBDA,X) = 0 .
-      INTERFACE
-         SUBROUTINE RHOA(A,LAMBDA,X)
-         USE REAL_PRECISION
-         REAL (KIND=R8), DIMENSION(:), INTENT(OUT):: A
-         REAL (KIND=R8), INTENT(IN):: LAMBDA,X(:)
-         END SUBROUTINE RHOA
-      END INTERFACE
-!
-! Interface for subroutine that returns in the vector V the Kth column
-! of the Jacobian matrix [D RHO/D LAMBDA, D RHO/DX] evaluated at the
-! point (A, LAMBDA, X).
-      INTERFACE
-         SUBROUTINE RHOJAC(A,LAMBDA,X,V,K)
-         USE REAL_PRECISION
-         REAL (KIND=R8), INTENT(IN):: A(:),X(:)
-         REAL (KIND=R8), INTENT(IN OUT):: LAMBDA
-         REAL (KIND=R8), INTENT(OUT):: V(:)
-         INTEGER, INTENT(IN):: K
-         END SUBROUTINE RHOJAC
-      END INTERFACE
-! The following code is specifically for the polynomial system driver
-! POLSYS1H, and should be used verbatim with POLSYS1H in the external 
-! subroutine RHOJAC.  
-!     USE HOMPACK90_GLOBAL, ONLY: IPAR, PAR  ! FOR POLSYS1H ONLY.
-!     INTERFACE
-!       SUBROUTINE HFUNP(N,A,LAMBDA,X)
-!       USE REAL_PRECISION
-!       INTEGER, INTENT(IN):: N
-!       REAL (KIND=R8), INTENT(IN):: A(2*N),LAMBDA,X(2*N)
-!       END SUBROUTINE HFUNP
-!     END INTERFACE
-!     INTEGER:: J,NPOL,N2
-!     NPOL=IPAR(1)
-!     N2=2*NPOL
-!     IF (K .EQ. 1) THEN
-! FORCE PREDICTED POINT TO HAVE  LAMBDA .GE. 0  .
-!       IF (LAMBDA .LT. 0.0) LAMBDA=0.0
-!       CALL HFUNP(NPOL,A,LAMBDA,X)
-!       DO J=1,N2
-!         V(J)=PAR(IPAR(3 + (6-1)) + (J-1))
-!       END DO
-!       RETURN
-!     ELSE
-!       DO J=1,N2
-!         V(J)=PAR(IPAR(3 + (5-1)) + (J-1) + N2*(K-2))
-!       END DO
-!     ENDIF
-!
-!     RETURN
-! If calling FIXP?? or STEP?? directly, supply appropriate replacement
-! code in the external subroutine RHOJAC.
-!
-!
-! Interface for subroutine that evaluates a sparse Jacobian matrix of
-! F(X) at X, and operates as follows:
-!
-! If MODE = 1,
-! evaluate the N x N symmetric Jacobian matrix of F(X) at X, and return
-! the result in packed skyline storage format in QRSPARSE.  LENQR is the
-! length of QRSPARSE, and ROWPOS contains the indices of the diagonal
-! elements of the Jacobian matrix within QRSPARSE.  ROWPOS(N+1) and
-! ROWPOS(N+2) are set by subroutine FODEDS.  The allocatable array COLPOS
-! is not used by this storage format.
-!
-! If MODE = 2,
-! evaluate the N x N Jacobian matrix of F(X) at X, and return the result
-! in sparse row storage format in QRSPARSE.  LENQR is the length of
-! QRSPARSE, ROWPOS contains the indices of where each row begins within
-! QRSPARSE, and COLPOS (of length LENQR) contains the column indices of
-! the corresponding elements in QRSPARSE.  Even if zero, the diagonal
-! elements of the Jacobian matrix must be stored in QRSPARSE.
-      INTERFACE
-         SUBROUTINE FJACS(X)
-         USE REAL_PRECISION
-         USE HOMPACK90_GLOBAL, ONLY: QRSPARSE, ROWPOS, COLPOS
-         REAL (KIND=R8), DIMENSION(:), INTENT(IN):: X
-         END SUBROUTINE FJACS
-      END INTERFACE
-!
-!
-! Interface for subroutine that evaluates a sparse Jacobian matrix of
-! RHO(A,X,LAMBDA) at (A,X,LAMBDA), and operates as follows:
-!
-! If MODE = 1,
-! evaluate the N X N symmetric Jacobian matrix [D RHO/DX] at
-! (A,X,LAMBDA), and return the result in packed skyline storage format in
-! QRSPARSE.  LENQR is the length of QRSPARSE, and ROWPOS contains the
-! indices of the diagonal elements of [D RHO/DX] within QRSPARSE.  PP
-! contains -[D RHO/D LAMBDA] evaluated at (A,X,LAMBDA).  Note the minus
-! sign in the definition of PP.  The allocatable array COLPOS is not used
-! in this storage format.
-!
-! If MODE = 2,
-! evaluate the N X (N+1) Jacobian matrix [D RHO/DX, D RHO/DLAMBDA] at
-! (A,X,LAMBDA), and return the result in sparse row storage format in
-! QRSPARSE.  LENQR is the length of QRSPARSE, ROWPOS contains the indices
-! of where each row begins within QRSPARSE, and COLPOS (of length LENQR)
-! contains the column indices of the corresponding elements in QRSPARSE.
-! Even if zero, the diagonal elements of the Jacobian matrix must be
-! stored in QRSPARSE.  The allocatable array PP is not used in this
-! storage format.
-!
-      INTERFACE
-         SUBROUTINE RHOJS(A,LAMBDA,X)
-         USE REAL_PRECISION
-         USE HOMPACK90_GLOBAL, ONLY: QRSPARSE, ROWPOS, COLPOS
-         REAL (KIND=R8), INTENT(IN):: A(:),LAMBDA,X(:)
-         END SUBROUTINE RHOJS
-      END INTERFACE
-      END MODULE HOMOTOPY
-
-      SUBROUTINE STEPNX(N,NFE,IFLAG,START,CRASH,HOLD,H,RELERR,   &
-         ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-!
-!  STEPNX  takes one step along the zero curve of the homotopy map
-! using a predictor-corrector algorithm.  The predictor uses a Hermite
-! cubic interpolant, and the corrector returns to the zero curve along
-! the flow normal to the Davidenko flow.  STEPNX  also estimates a
-! step size H for the next step along the zero curve.  STEPNX  is an
-! expert user version of STEPN(F|S), written using the reverse call
-! protocol.  All matrix data structures and numerical linear algebra
-! are the responsibility of the calling program.  STEPNX  indicates to
-! the calling program, via flags, at which points  RHO(A,LAMBDA,X)  and
-! [ D RHO(A,LAMBDA,X)/D LAMBDA, D RHO(A,LAMBDA,X)/DX ]  must be
-! evaluated, and what linear algebra must be done with these functions.
-! Out of range arguments can also be signaled to  STEPNX , which will
-! attempt to modify its steplength algorithm to reflect this
-! information.
-!
-! The following interface block should be inserted in the calling
-! program:
-!
-!     INTERFACE
-!       SUBROUTINE STEPNX(N,NFE,IFLAG,START,CRASH,HOLD,H,RELERR,
-!    &    ABSERR,S,Y,YP,YOLD,YPOLD,A,TZ,W,WP,RHOLEN,SSPAR)
-!       USE HOMOTOPY
-!       USE REAL_PRECISION
-!       INTEGER, INTENT(IN):: N
-!       INTEGER, INTENT(IN OUT):: NFE,IFLAG
-!       LOGICAL, INTENT(IN OUT):: START,CRASH
-!       REAL (KIND=R8), INTENT(IN OUT):: HOLD,H,RELERR,ABSERR,S,RHOLEN,
-!    &    SSPAR(8)
-!       REAL (KIND=R8), DIMENSION(:), INTENT(IN):: A
-!       REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: Y,YP,YOLD,YPOLD,
-!    &    TZ,W,WP
-!       REAL (KIND=R8), DIMENSION(:), ALLOCATABLE, SAVE:: Z0,Z1
-!       END SUBROUTINE STEPNX
-!     END INTERFACE
-!
-! ON INPUT:
-!
-! N = dimension of X and the homotopy map.
-!
-! NFE = number of Jacobian matrix evaluations.
-!
-! IFLAG = -2, -1, or 0, indicating the problem type, on the first
-!         call to  STEPNX .  STEPNX  does not distinguish between
-!         these values, but they are permitted for consistency with
-!         the rest of HOMPACK.
-!
-!       = 0-10*R, -1-10*R, or -2-10*R, R = 1,2,3, indicate to  STEPNX
-!         where to resume after a reverse call.  The calling program
-!         must not modify  IFLAG  after a reverse call, except as
-!         noted next.
-!
-!       = -40, -41, or -42, used for a final call to deallocate working
-!         storage, after all path tracking is finished.  START  and
-!         IFLAG  are reset on return.
-!
-!       = -100-10*R, -101-10*R, -102-10*R, R = 1,2,3, indicate to
-!         STEPNX  where to resume after a reverse call, and that the
-!         requested evaluation point was out of range.  STEPNX  will
-!         reduce  H  and try again.
-!
-! START = .TRUE. on first call to  STEPNX , .FALSE. otherwise.
-!
-! HOLD = ||Y - YOLD||; should not be modified by the user.
-!
-! H = upper limit on length of step that will be attempted.  H  must be
-!    set to a positive number on the first call to  STEPNX .
-!    Thereafter  STEPNX  calculates an optimal value for  H , and  H
-!    should not be modified by the user.
-!
-! RELERR, ABSERR = relative and absolute error values.  The iteration is
-!    considered to have converged when a point W=(LAMBDA,X) is found 
-!    such that
-!
-!    ||Z|| <= RELERR*||W|| + ABSERR  ,          where
-!
-!    Z is the Newton step to W=(LAMBDA,X).
-!
-! S = (approximate) arc length along the homotopy zero curve up to
-!    Y(S) = (LAMBDA(S), X(S)).
-!
-! Y(1:N+1) = previous point (LAMBDA(S), X(S)) found on the zero curve of 
-!    the homotopy map.
-!
-! YP(1:N+1) = unit tangent vector to the zero curve of the homotopy map
-!    at  Y .
-!
-! YOLD(1:N+1) = a point before  Y  on the zero curve of the homotopy map.
-!
-! YPOLD(1:N+1) = unit tangent vector to the zero curve of the homotopy
-!    map at  YOLD .
-!
-! A(:) = parameter vector in the homotopy map.
-!
-! TZ(1:N+1), W(1:N+1), and WP(1:N+1)  are work arrays used for the
-!    Newton step calculation and the interpolation.  On reentry after
-!    a reverse call,  WP  and  TZ  contain the tangent vector and
-!    Newton step, respectively, at the point  W .  Precisely,
-!    D RHO(A,W)/DW WP = 0,  WP^T YP > 0,  ||WP|| = 1,
-!    and  TZ  is the minimum norm solution of
-!    D RHO(A,W)/DW TZ = - RHO(A,W).
-!
-! RHOLEN = ||RHO(A,W)||_2 is required by some reverse calls.
-!
-! SSPAR(1:8) = (LIDEAL, RIDEAL, DIDEAL, HMIN, HMAX, BMIN, BMAX, P)  is
-!    a vector of parameters used for the optimal step size estimation.
-!    If  SSPAR(J) .LE. 0.0  on input, it is reset to a default value
-!    by  STEPNX .  Otherwise the input value of  SSPAR(J)  is used.
-!    See the comments below in  STEPNX  for more information about
-!    these constants.
-!
-!
-! ON OUTPUT:
-!
-! N  and  A  are unchanged.
-!
-! NFE  has been updated.
-!
-! IFLAG  
-!    = -22, -21, -20, -32, -31, or -30 requests the calling program to
-!      return the unit tangent vector in  WP , the normal flow Newton
-!      step in  TZ , and the 2-norm of the homotopy map in  RHOLEN ,
-!      all evaluated at the point  W .
-!
-!    = -12, -11, or -10 requests the calling program to return in  WP
-!      the unit tangent vector at  W .
-!
-!    = -2, -1, or 0 (unchanged) on a normal return after a successful
-!      step.
-!
-!    = 4 if a Jacobian matrix with rank < N has occurred.  The
-!        iteration was not completed.
-!
-!    = 6 if the iteration failed to converge.  W  contains the last
-!        Newton iterate.
-!
-!    = 7 if input arguments or array sizes are invalid, or  IFLAG  was
-!        changed during a reverse call.
-!
-! START = .FALSE. on a normal return.
-!
-! CRASH 
-!    = .FALSE. on a normal return.
-!
-!    = .TRUE. if the step size  H  was too small.  H  has been
-!      increased to an acceptable value, with which  STEPNX  may be
-!      called again.
-!
-!    = .TRUE. if  RELERR  and/or  ABSERR  were too small.  They have
-!      been increased to acceptable values, with which  STEPNX  may
-!      be called again.
-!
-! HOLD = ||Y - YOLD||.
-!
-! H = optimal value for next step to be attempted.  Normally  H  should
-!    not be modified by the user.
-!
-! RELERR, ABSERR  are unchanged on a normal return.
-!
-! S = (approximate) arc length along the zero curve of the homotopy map 
-!    up to the latest point found, which is returned in  Y .
-!
-! Y, YP, YOLD, YPOLD  contain the two most recent points and tangent
-!    vectors found on the zero curve of the homotopy map.
-!
-! SSPAR  may have been changed to default values.
-!
-!
-! Z0(1:N+1), Z1(1:N+1)  are allocatable work arrays used for the
-!    estimation of the next step size  H .
-!
-! Calls  DNRM2 .
-!
-      USE HOMOTOPY
-      USE REAL_PRECISION
-      INTEGER, INTENT(IN):: N
-      INTEGER, INTENT(IN OUT):: NFE,IFLAG
-      LOGICAL, INTENT(IN OUT):: START,CRASH
-      REAL (KIND=R8), INTENT(IN OUT):: HOLD,H,RELERR,ABSERR,S,RHOLEN,   &
-        SSPAR(8)
-      REAL (KIND=R8), DIMENSION(:), INTENT(IN):: A
-      REAL (KIND=R8), DIMENSION(:), INTENT(IN OUT):: Y,YP,YOLD,YPOLD,   &
-        TZ,W,WP
-      REAL (KIND=R8), DIMENSION(:), ALLOCATABLE, SAVE:: Z0,Z1
-!
-! ***** LOCAL VARIABLES. *****
-!
-      REAL (KIND=R8), SAVE:: DCALC,DELS,F0,F1,FOURU,FP0,FP1,   &
-        HFAIL,HT,LCALC,RCALC,TEMP,TWOU
-      INTEGER, SAVE:: IFLAGC,ITNUM,J,JUDY,NP1
-      LOGICAL, SAVE:: FAIL
-!
-! ***** END OF SPECIFICATION INFORMATION. *****
-!
-! THE LIMIT ON THE NUMBER OF NEWTON ITERATIONS ALLOWED BEFORE REDUCING
-! THE STEP SIZE  H  MAY BE CHANGED BY CHANGING THE FOLLOWING PARAMETER 
-! STATEMENT:
-      INTEGER, PARAMETER:: LITFH=4
-!
-! DEFINITION OF HERMITE CUBIC INTERPOLANT VIA DIVIDED DIFFERENCES.
-!
-      REAL (KIND=R8):: DD001,DD0011,DD01,DD011,DNRM2,QOFS
-      DD01(F0,F1,DELS)=(F1-F0)/DELS
-      DD001(F0,FP0,F1,DELS)=(DD01(F0,F1,DELS)-FP0)/DELS
-      DD011(F0,F1,FP1,DELS)=(FP1-DD01(F0,F1,DELS))/DELS
-      DD0011(F0,FP0,F1,FP1,DELS)=(DD011(F0,F1,FP1,DELS) -    &
-                                  DD001(F0,FP0,F1,DELS))/DELS
-      QOFS(F0,FP0,F1,FP1,DELS,S)=((DD0011(F0,FP0,F1,FP1,DELS)*(S-DELS) +   &
-         DD001(F0,FP0,F1,DELS))*S + FP0)*S + F0
-!
-!
-      NP1=N+1
-      IF (IFLAG > 0) RETURN
-      IF ((START .AND. IFLAG < -2) .OR. SIZE(Y) /= NP1 .OR.   &
-        SIZE(YP) /= NP1 .OR. SIZE(YOLD) /= NP1 .OR.   &
-        SIZE(YPOLD) /= NP1 .OR. SIZE(TZ) /= NP1 .OR.   &
-        SIZE(W) /= NP1 .OR. SIZE(WP) /= NP1 .OR.   &
-        (.NOT. START .AND. -MOD(-IFLAG,100) /= IFLAGC .AND.   &
-        ABS(IFLAG)/10 /= 4)) THEN
-        IFLAG=7
-        RETURN
-      ENDIF
-      IFLAGC=-MOD(-IFLAG,10)
-!
-! PICK UP EXECUTION WEHRE IT LEFT OFF AFTER A REVERSE CALL.
-!
-      IF (IFLAG < -2) THEN
-        GO TO (50,100,400,700), MOD(ABS(IFLAG),100)/10
-      ENDIF
-      TWOU=2.0*EPSILON(1.0_R8)
-      FOURU=TWOU+TWOU
-      CRASH=.TRUE.
-! THE ARCLENGTH  S  MUST BE NONNEGATIVE.
-      IF (S .LT. 0.0) RETURN
-! IF STEP SIZE IS TOO SMALL, DETERMINE AN ACCEPTABLE ONE.
-      IF (H .LT. FOURU*(1.0+S)) THEN
-        H=FOURU*(1.0+S)
-        RETURN
-      ENDIF
-! IF ERROR TOLERANCES ARE TOO SMALL, INCREASE THEM TO ACCEPTABLE VALUES.
-      TEMP=DNRM2(NP1,Y,1)+1.0
-      IF (.5*(RELERR*TEMP+ABSERR) .LT. TWOU*TEMP) THEN
-        IF (RELERR .NE. 0.0) THEN
-          RELERR=FOURU*(1.0+FOURU)
-          ABSERR=MAX(ABSERR,0.0_R8)
-        ELSE
-          ABSERR=FOURU*TEMP
-        ENDIF
-        RETURN
-      ENDIF
-      CRASH=.FALSE.
-      IF (.NOT. START) GO TO 300
-!
-! *****  STARTUP SECTION (FIRST STEP ALONG ZERO CURVE).  *****
-!
-      FAIL=.FALSE.
-      START=.FALSE.
-      IF (ALLOCATED(Z0)) DEALLOCATE(Z0)
-      IF (ALLOCATED(Z1)) DEALLOCATE(Z1)
-      ALLOCATE(Z0(NP1),Z1(NP1))
-!
-! SET OPTIMAL STEP SIZE ESTIMATION PARAMETERS.
-! LET Z[K] DENOTE THE NEWTON ITERATES ALONG THE FLOW NORMAL TO THE
-! DAVIDENKO FLOW AND Y THEIR LIMIT.
-! IDEAL CONTRACTION FACTOR:  ||Z[2] - Z[1]|| / ||Z[1] - Z[0]||
-      IF (SSPAR(1) .LE. 0.0) SSPAR(1)= .5
-! IDEAL RESIDUAL FACTOR:  ||RHO(A, Z[1])|| / ||RHO(A, Z[0])||
-      IF (SSPAR(2) .LE. 0.0) SSPAR(2)= .01
-! IDEAL DISTANCE FACTOR:  ||Z[1] - Y|| / ||Z[0] - Y||
-      IF (SSPAR(3) .LE. 0.0) SSPAR(3)= .5
-! MINIMUM STEP SIZE  HMIN .
-      IF (SSPAR(4) .LE. 0.0) SSPAR(4)=(SQRT(N+1.0)+4.0)*EPSILON(1.0_R8)
-! MAXIMUM STEP SIZE  HMAX .
-      IF (SSPAR(5) .LE. 0.0) SSPAR(5)= 1.0
-! MINIMUM STEP SIZE REDUCTION FACTOR  BMIN .
-      IF (SSPAR(6) .LE. 0.0) SSPAR(6)= .1_R8
-! MAXIMUM STEP SIZE EXPANSION FACTOR  BMAX .
-      IF (SSPAR(7) .LE. 0.0) SSPAR(7)= 3.0
-! ASSUMED OPERATING ORDER  P .
-      IF (SSPAR(8) .LE. 0.0) SSPAR(8)= 2.0
-!
-! DETERMINE SUITABLE INITIAL STEP SIZE.
-      H=MIN(H, .10_R8, SQRT(SQRT(RELERR*TEMP+ABSERR)))
-! USE LINEAR PREDICTOR ALONG TANGENT DIRECTION TO START NEWTON ITERATION.
-      YPOLD(1)=1.0
-      YPOLD(2:NP1)=0.0
-! REQUEST TANGENT VECTOR AT Y VIA REVERSE CALL.
-      W=Y
-      YP=YPOLD
-      IFLAG=IFLAGC-10
-      IFLAGC=IFLAG
-      NFE=NFE+1
-      RETURN
- 50   YP=WP
-! IF THE STARTING POINT IS OUT OF RANGE, GIVE UP.
-      IF (IFLAG .LE. -100) THEN
-        IFLAG=6
-        RETURN
-      ENDIF
- 70   W=Y + H*YP
-      Z0=W
-      JUDY=1                                    ! DO JUDY=1,LITFH
- 80   IF (JUDY > LITFH) GO TO 200
-! REQUEST THE CALCULATION OF THE NEWTON STEP  TZ  AT THE CURRENT
-! POINT  W  VIA REVERSE CALL.
-        IFLAG=IFLAGC-20
-        IFLAGC=IFLAG
-        NFE=NFE+1
-        RETURN
-100     IF (IFLAG .LE. -100) GO TO 200
-!
-! TAKE NEWTON STEP AND CHECK CONVERGENCE.
-        W=W + TZ
-        ITNUM=JUDY
-! COMPUTE QUANTITIES USED FOR OPTIMAL STEP SIZE ESTIMATION.
-        IF (JUDY .EQ. 1) THEN
-          LCALC=DNRM2(NP1,TZ,1)
-          RCALC=RHOLEN
-          Z1=W
-        ELSE IF (JUDY .EQ. 2) THEN
-          LCALC=DNRM2(NP1,TZ,1)/LCALC
-          RCALC=RHOLEN/RCALC
-        ENDIF
-! GO TO MOP-UP SECTION AFTER CONVERGENCE.
-        IF (DNRM2(NP1,TZ,1) .LE. RELERR*DNRM2(NP1,W,1)+ABSERR)   &
-                                                       GO TO 600
-!
-        JUDY=JUDY+1
-      GO TO 80                                   ! END DO
-!
-! NO CONVERGENCE IN  LITFH  ITERATIONS.  REDUCE  H  AND TRY AGAIN.
-200   IF (H .LE. FOURU*(1.0 + S)) THEN
-        IFLAG=6
-        RETURN
-      ENDIF
-      H=.5 * H
-      GO TO 70
-!
-! ***** END OF STARTUP SECTION. *****
-!
-! ***** PREDICTOR SECTION. *****
-!
-300   FAIL=.FALSE.
-! COMPUTE POINT PREDICTED BY HERMITE INTERPOLANT.  USE STEP SIZE  H
-! COMPUTED ON LAST CALL TO  STEPNX .
-320   DO J=1,NP1
-        W(J)=QOFS(YOLD(J),YPOLD(J),Y(J),YP(J),HOLD,HOLD+H)
-      END DO
-      Z0=W 
-!
-! ***** END OF PREDICTOR SECTION. *****
-!
-! ***** CORRECTOR SECTION. *****
-!
-      JUDY=1                          ! CORRECTOR: DO JUDY=1,LITFH
-350   IF (JUDY > LITFH) GO TO 500
-! REQUEST THE CALCULATION OF THE NEWTON STEP  TZ  AT THE CURRENT
-! POINT  W  VIA REVERSE CALL.
-        IFLAG=IFLAGC-30
-        IFLAGC=IFLAG
-        NFE=NFE+1
-        RETURN
-400     IF (IFLAG .LE. -100) GO TO 500
-!
-! TAKE NEWTON STEP AND CHECK CONVERGENCE.
-        W=W + TZ
-        ITNUM=JUDY
-! COMPUTE QUANTITIES USED FOR OPTIMAL STEP SIZE ESTIMATION.
-        IF (JUDY .EQ. 1) THEN
-          LCALC=DNRM2(NP1,TZ,1)
-          RCALC=RHOLEN
-          Z1=W
-        ELSE IF (JUDY .EQ. 2) THEN
-          LCALC=DNRM2(NP1,TZ,1)/LCALC
-          RCALC=RHOLEN/RCALC
-        ENDIF
-! GO TO MOP-UP SECTION AFTER CONVERGENCE.
-        IF (DNRM2(NP1,TZ,1) .LE. RELERR*DNRM2(NP1,W,1)+ABSERR)   &
-                                                       GO TO 600
-!
-        JUDY=JUDY+1
-      GO TO 350                              ! END DO CORRECTOR
-!
-! NO CONVERGENCE IN  LITFH  ITERATIONS.  RECORD FAILURE AT CALCULATED  H , 
-! SAVE THIS STEP SIZE, REDUCE  H  AND TRY AGAIN.
-500   FAIL=.TRUE.
-      HFAIL=H
-      IF (H .LE. FOURU*(1.0 + S)) THEN
-        IFLAG=6
-        RETURN
-      ENDIF
-      H=.5 * H
-      GO TO 320
-!
-! ***** END OF CORRECTOR SECTION. *****
-!
-! ***** MOP-UP SECTION. *****
-!
-! YOLD  AND  Y  ALWAYS CONTAIN THE LAST TWO POINTS FOUND ON THE ZERO
-! CURVE OF THE HOMOTOPY MAP.  YPOLD  AND  YP  CONTAIN THE TANGENT
-! VECTORS TO THE ZERO CURVE AT  YOLD  AND  Y , RESPECTIVELY.
-!
-600   YPOLD=YP
-      YOLD=Y
-      Y=W
-      YP=WP
-      W=Y - YOLD
-! UPDATE ARC LENGTH.
-      HOLD=DNRM2(NP1,W,1)
-      S=S+HOLD
-!
-! ***** END OF MOP-UP SECTION. *****
-!
-! ***** OPTIMAL STEP SIZE ESTIMATION SECTION. *****
-!
-! CALCULATE THE DISTANCE FACTOR  DCALC .
-      TZ=Z0 - Y
-      W=Z1 - Y
-      DCALC=DNRM2(NP1,TZ,1)
-      IF (DCALC .NE. 0.0) DCALC=DNRM2(NP1,W,1)/DCALC
-!
-! THE OPTIMAL STEP SIZE HBAR IS DEFINED BY
-!
-!   HT=HOLD * [MIN(LIDEAL/LCALC, RIDEAL/RCALC, DIDEAL/DCALC)]**(1/P)
-!
-!     HBAR = MIN [ MAX(HT, BMIN*HOLD, HMIN), BMAX*HOLD, HMAX ]
-!
-! IF CONVERGENCE HAD OCCURRED AFTER 1 ITERATION, SET THE CONTRACTION
-! FACTOR  LCALC  TO ZERO.
-      IF (ITNUM .EQ. 1) LCALC = 0.0
-! FORMULA FOR OPTIMAL STEP SIZE.
-      IF (LCALC+RCALC+DCALC .EQ. 0.0) THEN
-        HT = SSPAR(7) * HOLD
-      ELSE 
-        HT = (1.0/MAX(LCALC/SSPAR(1), RCALC/SSPAR(2), DCALC/SSPAR(3)))   &
-             **(1.0/SSPAR(8)) * HOLD
-      ENDIF
-!  HT  CONTAINS THE ESTIMATED OPTIMAL STEP SIZE.  NOW PUT IT WITHIN
-! REASONABLE BOUNDS.
-      H=MIN(MAX(HT,SSPAR(6)*HOLD,SSPAR(4)), SSPAR(7)*HOLD, SSPAR(5))
-      IF (ITNUM .EQ. 1) THEN
-! IF CONVERGENCE HAD OCCURRED AFTER 1 ITERATION, DON'T DECREASE  H .
-        H=MAX(H,HOLD)
-      ELSE IF (ITNUM .EQ. LITFH) THEN
-! IF CONVERGENCE REQUIRED THE MAXIMUM  LITFH  ITERATIONS, DON'T
-! INCREASE  H .
-        H=MIN(H,HOLD)
-      ENDIF
-! IF CONVERGENCE DID NOT OCCUR IN  LITFH  ITERATIONS FOR A PARTICULAR
-! H = HFAIL , DON'T CHOOSE THE NEW STEP SIZE LARGER THAN  HFAIL .
-      IF (FAIL) H=MIN(H,HFAIL)
-!
-!
-      IFLAG=IFLAGC
-      RETURN
-! CLEAN UP ALLOCATED WORKING STORAGE.
- 700  START=.TRUE.
-      IFLAG=IFLAGC
-      IF (ALLOCATED(Z0)) DEALLOCATE(Z0)
-      IF (ALLOCATED(Z1)) DEALLOCATE(Z1)
-      RETURN
-      END SUBROUTINE STEPNX
diff --git a/sandbox/857/test_install.f90 b/sandbox/857/test_install.f90
deleted file mode 100644
index e3072dc..0000000
--- a/sandbox/857/test_install.f90
+++ /dev/null
@@ -1,264 +0,0 @@
-! This file contains a main program to test the correctness of the
-! compiled code; it is uncommented and has no further use beyond testing
-! the installation.  Authors: Layne T. Watson and Masha Sosonkina, 8/2004.
-
-! Compile this file (free form Fortran 95) and link it to the object
-! files from the compiles of polsys_glp.f90 (free form) and lapack_glp.f
-! (fixed format).  Then run the executable with input file INPUT.DAT
-! (upper case).  A message indicating apparent success or failure of the
-! installation is written to standard out.
-
-PROGRAM TEST_INSTALL
-
-USE POLSYS2
-
-IMPLICIT NONE
-INTEGER, PARAMETER:: MMAXT = 100, NN = 20
-INTEGER:: BGLP, I, IFLAG1, J, N, NUMRR = 1
-INTEGER, DIMENSION(NN):: NUM_SETS, NUM_TERMS
-INTEGER, DIMENSION(NN,NN):: NUM_INDICES, SET_DEG
-INTEGER, DIMENSION(NN,NN,NN):: INDEX
-INTEGER, DIMENSION(NN,MMAXT,NN):: DEG
-INTEGER, DIMENSION(:), POINTER:: IFLAG2, INDEX_PATH_TRACKED, NFE
-REAL (KIND=R8):: FINALTOL, SINGTOL, TRACKTOL
-REAL (KIND=R8), DIMENSION(8):: SSPAR
-REAL (KIND=R8), DIMENSION(NN):: SCALE_FACTORS
-REAL (KIND=R8), DIMENSION(:), POINTER:: ARCLEN, LAMBDA
-COMPLEX (KIND=R8), DIMENSION(NN,MMAXT):: COEF
-COMPLEX (KIND=R8), DIMENSION(:,:), POINTER:: ROOTS
-COMPLEX (KIND=R8), DIMENSION(2,4):: EROOTS = RESHAPE(SOURCE=(/  &
-  (  2.34233851959121E+03_R8,  0.0E00_R8),   &
-  ( -7.88344824094120E-01_R8,  0.0E00_R8),   &
-  (  9.08921229615388E-02_R8,  0.0E00_R8),   &
-  ( -9.11497098197499E-02_R8,  0.0E00_R8),   &
-  (  1.61478579234357E-02_R8,  1.68496955498881E+00_R8),     &
-  (  2.67994739614461E-04_R8,  4.42802993973661E-03_R8),     &
-  (  1.61478579234359E-02_R8, -1.68496955498881E+00_R8),     &
-  (  2.67994739614461E-04_R8, -4.42802993973661E-03_R8)  /), &
-  SHAPE=(/ 2,4 /) )
-CHARACTER (LEN=80):: TITLE
-CHARACTER (LEN=80), DIMENSION(NN):: DG, P
-LOGICAL:: NEW_PROBLEM, ROOT_COUNT_ONLY
-
-! MPI variables.
-INTEGER, PARAMETER:: MASTER_PROC = 0 !Process 0 is the master process.
-INTEGER:: IERR, RC
-INTEGER:: NUM_PROC  ! The number of processes.
-INTEGER:: RANK_PROC ! The process RANK_PROC.
-
-INTEGER, DIMENSION(:), POINTER:: PATH_COUNT,PATH_COUNT_DISP
-
-NAMELIST /PROBLEM/ COEF,DEG,FINALTOL,N,NEW_PROBLEM,NUMRR,NUM_TERMS,&
-                   TITLE,TRACKTOL,SINGTOL,SSPAR
-NAMELIST /SYSGLPSET/ DG,INDEX,NUM_INDICES,NUM_SETS,P,ROOT_COUNT_ONLY,SET_DEG
-
-NULLIFY(IFLAG2, NFE, ARCLEN, LAMBDA, ROOTS) ! Disassociate pointers.
-
-! MAIN_TEMPLATE reads the target polynomial system definition and the
-! system covering specification from the file INPUT.TXT.
-! Let the system do what it needs to start up MPI.
-CALL MPI_INIT(IERR)
-
-IF (IERR .NE. 0) THEN
- WRITE (*,*) 'Error starting MPI program. Terminating.'
- CALL MPI_ABORT(MPI_COMM_WORLD, RC, IERR)
- STOP
-END IF
-
-! Get my processor number, RANK_PROC.
-CALL MPI_COMM_RANK(MPI_COMM_WORLD, RANK_PROC, IERR)
-! Get the total number of processors used.
-CALL MPI_COMM_SIZE(MPI_COMM_WORLD, NUM_PROC, IERR)
-
-IF (RANK_PROC .EQ. MASTER_PROC) THEN
-  WRITE (*,*) 'Total of ', NUM_PROC, ' processors have been initialized.'
-END IF
-
-ALLOCATE(PATH_COUNT(NUM_PROC))
-ALLOCATE(PATH_COUNT_DISP(NUM_PROC))
-
-OPEN (UNIT=3,FILE='INPUT.DAT',ACTION='READ',POSITION='REWIND',   &
-  DELIM='APOSTROPHE',STATUS='OLD')
-
-SSPAR(1:8) = 0.0_R8 ; DEG = 0 ; COEF = (0.0_R8,0.0_R8)
-
-READ (3,NML=PROBLEM)
-
-IF (NEW_PROBLEM) THEN
-CALL CLEANUP_POL
-ALLOCATE(POLYNOMIAL(N))
-DO I=1,N
-  POLYNOMIAL(I)%NUM_TERMS=NUM_TERMS(I)
-  ALLOCATE(POLYNOMIAL(I)%TERM(NUM_TERMS(I)))
-  DO J=1,NUM_TERMS(I)
-    ALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG(N+1))
-    POLYNOMIAL(I)%TERM(J)%COEF=COEF(I,J) 
-    POLYNOMIAL(I)%TERM(J)%DEG(1:N)=DEG(I,J,1:N)
-  END DO
-END DO
-END IF
-
-READ (3,NML=SYSGLPSET)
-
-! Allocate storage for the system set structure in COVER.
-CALL CLEANUP_PAR
-ALLOCATE(COVER_SIZES(N))
-COVER_SIZES(1:N) = NUM_SETS(1:N)
-ALLOCATE(COVER(N))
-DO I=1,N
-  ALLOCATE(COVER(I)%SET(COVER_SIZES(I)))
-  DO J=1,COVER_SIZES(I)
-    COVER(I)%SET(J)%NUM_INDICES = NUM_INDICES(I,J)
-    COVER(I)%SET(J)%SET_DEG = SET_DEG(I,J)
-    ALLOCATE(COVER(I)%SET(J)%INDEX(NUM_INDICES(I,J)))
-    COVER(I)%SET(J)%INDEX(1:NUM_INDICES(I,J)) = &
-                    INDEX(I,J,1:NUM_INDICES(I,J))
-  END DO
-END DO
-
-! Compute roots of the target polynomial system.
-CALL POLSYS_GLP(INDEX_PATH_TRACKED, PATH_COUNT(RANK_PROC+1), &
-    N,TRACKTOL,FINALTOL,SINGTOL,SSPAR,BGLP,IFLAG1,IFLAG2, &
-    ARCLEN,LAMBDA,ROOTS,NFE,SCALE_FACTORS)
-
-! Gather ROOTS.
-CALL MPI_GATHER(PATH_COUNT(RANK_PROC+1),1,MPI_INTEGER,PATH_COUNT, &
-    1,MPI_INTEGER,MASTER_PROC,MPI_COMM_WORLD,IERR)
-
-IF (RANK_PROC .EQ. MASTER_PROC) THEN
-  PATH_COUNT_DISP(1) = 0
-  DO I=2,NUM_PROC
-    PATH_COUNT_DISP(I) = PATH_COUNT_DISP(I-1) + PATH_COUNT(I-1)
-  END DO
-END IF
-
-CALL MPI_GATHERV(ROOTS, (N+1)*PATH_COUNT(RANK_PROC+1), MPI_DOUBLE_COMPLEX, &
-                 ROOTS, (N+1)*PATH_COUNT, (N+1)*PATH_COUNT_DISP, &
-                 MPI_DOUBLE_COMPLEX, &
-                 MASTER_PROC, MPI_COMM_WORLD,IERR)
-
-IF (RANK_PROC .EQ. MASTER_PROC) THEN
-  SINGTOL = 0.0_R8
-  DO I=1,BGLP
-    SINGTOL = MAX(SINGTOL, MINVAL(SUM(ABS(SPREAD(   &
-      EROOTS(1:2,I),DIM=2,NCOPIES=BGLP) - ROOTS(1:2,1:BGLP)), DIM=1)))
-  END DO
-
-  IF (SINGTOL < 1.0E-6_R8) THEN
-    WRITE (*,*) 'Test problem was solved correctly. The installation ', &
-      'appears correct.'
-  ELSE
-    WRITE (*,*) 'Warning!  Test problem was not solved correctly.'
-  END IF
-END IF
-
-CLOSE (UNIT=3)
-DEALLOCATE(PATH_COUNT,PATH_COUNT_DISP)
-CALL CLEANUP_POL
-CALL CLEANUP_PAR
-
-CALL MPI_FINALIZE(IERR)
-
-STOP
-
-CONTAINS
-
-SUBROUTINE CLEANUP_POL
-
-! Deallocates structure POLYNOMIAL.
-
-IF (.NOT. ALLOCATED(POLYNOMIAL)) RETURN
-DO I=1,SIZE(POLYNOMIAL)
-  DO J=1,NUMT(I)
-    DEALLOCATE(POLYNOMIAL(I)%TERM(J)%DEG)
-  END DO
-  DEALLOCATE(POLYNOMIAL(I)%TERM)
-END DO
-DEALLOCATE(POLYNOMIAL)
-RETURN
-END SUBROUTINE CLEANUP_POL
-
-SUBROUTINE CLEANUP_PAR
-
-! Deallocates structure COVER.
-
-IF (.NOT. ALLOCATED(COVER)) RETURN
-DO I=1,SIZE(COVER)
-  DO J=1,COVER_SIZES(I)
-    DEALLOCATE(COVER(I)%SET(J)%INDEX)
-  END DO
-  DEALLOCATE(COVER(I)%SET)
-END DO
-DEALLOCATE(COVER)
-DEALLOCATE(COVER_SIZES)  
-RETURN
-END SUBROUTINE CLEANUP_PAR
-
-END PROGRAM TEST_INSTALL
-
-                                                                      !!!
-SUBROUTINE TARGET_SYSTEM_USER(N,PROJ_COEF,XC,F,DF)
-! Template for user written subroutine to evaluate the (complex) target
-! system F(XC) and its (complex) N x N Jacobian matrix DF(XC).  XC(1:N+1)
-! is in complex projective coordinates, and the homogeneous coordinate
-! XC(N+1) is explicitly eliminated from F(XC) and DF(XC) using the
-! projective transformation (cf. the comments in START_POINTS_GLP).  The
-! comments in the internal subroutine TARGET_SYSTEM should be read before
-! attempting to write this subroutine; pay particular attention to the
-! handling of the homogeneous coordinate XC(N+1).  DF(:,N+1) is not
-! referenced by the calling program.
-
-USE REAL_PRECISION
-USE GLOBAL_GLP
-IMPLICIT NONE
-INTEGER, INTENT(IN):: N
-COMPLEX (KIND=R8), INTENT(IN), DIMENSION(N+1):: PROJ_COEF,XC
-COMPLEX (KIND=R8), INTENT(OUT):: F(N), DF(N,N+1)
-
-! For greater efficiency, replace the following code (which is just the
-! internal POLSYS_GLP subroutine TARGET_SYSTEM) with hand-crafted code.
-
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-INTEGER:: DEGREE, I, J, K, L
-COMPLEX (KIND=R8):: T, TS
-DO I=1,N
-  TS = (0.0_R8, 0.0_R8)
-  DO J=1,POLYNOMIAL(I)%NUM_TERMS
-    T = POLYNOMIAL(I)%TERM(J)%COEF
-    DO K=1,N+1
-      DEGREE = POLYNOMIAL(I)%TERM(J)%DEG(K)
-      IF (DEGREE == 0) CYCLE
-      T = T * XC(K)**DEGREE
-    END DO
-    TS = TS + T
-  END DO
-  F(I) = TS
-END DO 
-
-DF = (0.0_R8,0.0_R8)
-
-DO I=1,N
-  DO J=1,N+1
-    TS = (0.0_R8,0.0_R8)
-    DO K=1,POLYNOMIAL(I)%NUM_TERMS
-      DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(J)
-      IF (DEGREE == 0) CYCLE
-      T = POLYNOMIAL(I)%TERM(K)%COEF * DEGREE * (XC(J)**(DEGREE - 1))
-      DO L=1,N+1
-        DEGREE = POLYNOMIAL(I)%TERM(K)%DEG(L)
-        IF ((L == J) .OR. (DEGREE == 0)) CYCLE
-        T = T * (XC(L)**DEGREE)
-      END DO
-      TS = TS + T
-    END DO
-    DF(I,J) = TS
-  END DO
-END DO
-
-DO I=1,N
-  DF(I,1:N) = DF(I,1:N) + PROJ_COEF(1:N) * DF(I,N+1)
-END DO
-! # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # # #
-
-RETURN
-END SUBROUTINE TARGET_SYSTEM_USER
diff --git a/sandbox/TODO-cui-sierpinski b/sandbox/TODO-cui-sierpinski
deleted file mode 100644
index 5ed2419..0000000
--- a/sandbox/TODO-cui-sierpinski
+++ /dev/null
@@ -1,18 +0,0 @@
-# some foldings giving sierpinksi rational maps
-
-fold0 := NewIMGMachine("a=<1,b,1,1,B,1>","b=<1,c,1,1,C,1>","c=<b^-1*c^-1,1,c*b*a,B^-1*C^-1,1,C*B*A>(1,2,3)(4,5,6)","A=(1,6)(2,5)(3,4)","B=<a^-1*b^-1*c^-1,1,1,c*b*a,1,1>(1,4)(2,6)(3,5)","C=<1,1,1,1,1,1>");
-
-
-fold3 := NewIMGMachine("a=<a^-1,1,b*a,A^-1,1,B*A>(1,2,3)(4,5,6)","b=<1,1,c,1,1,C>","c=<a,1,1,A,1,1>","A=(1,6)(2,5)(3,4)","B=<a^-1*b^-1*c^-1,1,1,c*b*a,1,1>(1,4)(2,6)(3,5)","C=<1,1,1,1,1,1>");
-
-# ((-0.0997478-I*0.253173)*z^6+(-1.8627-I*0.899578)*z^5+(4.53598+I*0.666373)*z^4+(-2.33911+I*1.88928)*z^3+(2.39538-I*2.95044)*z^2+(3.40135+I*0.64184)*z+(-0.500865+I*0.683808))/((0.569114+I*0.0164565)*z^6+(-0.32279+I*2.61196)*z^5+(-0.281454-I*0.393524)*z^4+(-0.571207+I*1.69902)*z^3+(-1.1612-I*4.51325)*z^2+(0.738798+I*0.317797)*z+1)
-
-fold1 := NewIMGMachine("a=<,,b,,,B>(1,2,3)(4,5,6)","b=<,,b*a/b,,,B*A/B>","A=<,,b*a,,,B*A>(3,6)","B=(1,6,5,4,3,2)");
-
-fold2 := NewIMGMachine("a=<,,b,,,B>(1,2,3)(4,5,6)","b=<,,b*a/b,,,B*A/B>","A=(1,6)(2,5)(3,4)","B=<B*A,,,b*a,,>(1,4)(2,6)(3,5)");
-
-# a degree-13 example by cui
-otherexple := NewIMGMachine(
-                      "a=<,a,,,,,,,,,,,>(1,5,11,6)(2,3)(4,10)(7,12)(8,13,9)",
-                      "b=<,,,b,,,,,,,,,>(1,7,13,2)(3,8)(4,5)(6,12)(9,11,10)",
-                      "c=<,,,,,c,,,,,,,>(1,3,9,4)(2,8)(5,10)(6,7)(11,13,12)");
diff --git a/sandbox/TODO-nekrashevych-tiles b/sandbox/TODO-nekrashevych-tiles
deleted file mode 100644
index 940c0dc..0000000
--- a/sandbox/TODO-nekrashevych-tiles
+++ /dev/null
@@ -1,40 +0,0 @@
-gp0 := FRGroup("a=<b,b,a*b,b*a>(1,2)(3,4)","b=<,b*a*b,a,>","g=<g,b,g,b>","P=(1,3)(2,4)","S=<g*a*b*P,P,g*a*b*S^-1,S^-1>(1,4)(2,3)");
-
-# have S = gamma*alpha*c*a, P = a*b*beta up to change of basis
-
-gp := FRGroup("alpha=(1,2)(3,4)","beta=<1,alpha,alpha,1>","gamma=<gamma,beta,gamma,beta>","a=(1,3)(2,4)","b=<a,a,a*alpha,a*alpha>","c=<b*beta,b*beta,c*gamma,c*gamma>");
-
-n := Nucleus(gp);
-p := AdjacencyPoset(gp);
-################################################################
-Belk+Koch:
-
-h := FRGroup("a=<b,,,b>","b=<c,c,,>","c=<d,(b*e*c)^-1,(a*f)^-1,>(1,4)(2,3)",
-  "d=<,a,,a>(1,2)(3,4)","e=<f,,f,>","f=<b^-1,,b*e,e>(1,3)(2,4)":IsMealyElement);
-
-27 bases
-58 poset elements
-################################################################
-
-h := FRGroup("P=<Q,Q,,>","Q=<R,,R,>","R=<,S,S,>(1,2)(3,4)",
-  "S=<P,P*S*U,,U^-1*S^-1>(1,3)(2,4)","T=<U,,,U>","U=<R^-1,,P^-1*Q^-1*T*Q*P,R*T>(1,4)(2,3)":IsFRMealyElement);
-
-################################################################
-Heisenberg:
-
-h := FRGroup("X=<X,X,t^-2*Y,t^-2*Y>(1,3)(2,4)",
-  "Y=<t,t,t*Y/X,t*Y/X>(1,3)(2,4)",
-  "t=<,t,,t>(1,2)(3,4)":IsFRMealyElement);
-
-################################################################
-Heisenberg+:
-
-h := FRGroup("tau=<,tau,,tau>(1,2)(3,4)",
-  "s=(1,3)(2,4)", "t=<tau/s/t,tau/s/t,t,t>":IsFRMealyElement);
-
-################################################################
-TODO:
-* compute graph of groups of tile, which will be contracting and cover the group. in particular, get presentation as cell complex of groups
-
-* what is height of poset?
-
diff --git a/sandbox/bad-cui b/sandbox/bad-cui
deleted file mode 100644
index 6f4aa30..0000000
--- a/sandbox/bad-cui
+++ /dev/null
@@ -1,8 +0,0 @@
-FUNCTION 0. 0. 0. 0. 2547.8436395224371 -548.79091134927762 928.73246745848087 644.48196836513318 -73.319958015704657 -148.03875412395624 61.487804557588049 -110.4012086721135 2.3381186199162864 0.88865218260634737 -4.8165608894785823 -2.2661728615521315 -0.14450071874696588 -0.30716507638205698 -0.043009186498051528 0.09095640531434758 -0.0063468042544087278 0.0056088979413039886 0.00061115071883121816 0.00045317629102164592 6.2093736672567975e-05 3.0885698329797458e-05 1.2222615050188922e-06 6.2098220885218948e-07 972.04207348180034 235.3324635313113 -85.265556300811539 -42.115568225669939 1288.9786127600671 -556.6471831141273 454.2614872950507 368.49461466605777 263.88597885341306 -335.87021666309295 439.85082170222068 -13.775545765313655 128.48067440305067 127.50311981911976 4.2907702669664856 45.554759388787467 -3.6947852287241774 6.7168095267298806 -0.70145783323081801 0.4593649032335112 -0.054588135099859304 0.010888002860015872 -0.001702254244963788 -4.7619210758529985e-05 0. 0. 0. 0.
-CYCLES 0. 0. 0 1 Infinity any 1 1 1. 0. 2 1
-IMAGE 1000 200
-POINTS 3
-0 0 1 2.0 0+0i
-0 0 -1 2.0 infty
-1 0 0 2.0 1+0i
-ARCS 0
diff --git a/sandbox/braidgroup-simpl.g b/sandbox/braidgroup-simpl.g
deleted file mode 100644
index c8da983..0000000
--- a/sandbox/braidgroup-simpl.g
+++ /dev/null
@@ -1,51 +0,0 @@
-m := PolynomialIMGMachine(2,[1/7]);
-f := StateSet(m);
-i := GroupHomomorphismByImages(f,f,[f.1^(f.2*f.1),f.2^(f.1),f.3,f.4]);
-SetInfoLevel(InfoFR,3);
-ProfileGlobalFunctions(true);
-ProfileOperationsAndMethodsOn();
-RationalFunction(m^(i^15));
-
-bg := function(f,rel)
-    local n, i, g, a, s, u, v;
-
-    g := GeneratorsOfGroup(f);
-    n := Length(g);
-    a := [];
-    for i in [1..n] do
-        s := ShallowCopy(g);
-        u := Subword(rel,i,i);
-        v := Subword(rel,i mod n+1,i mod n+1);
-        s[Position(g,u)] := v;
-        s[Position(g,v)] := u^v;
-	s := GroupHomomorphismByImages(f,f,g,s);
-        SetName(s,Concatenation("(",String(u),String(v),")"));
-        Add(a,s);
-	s := s^-1;
-        SetName(s,Concatenation("(",String(v),String(u),")"));
-        Add(a,s);
-    od;
-    return a;
-end;
-
-simpl := function(m,rel)
-    local bgen, g, i, len, newm, newlen, twist, idle;
-
-    bgen := bg(Source(m),rel);
-    g := GeneratorsOfGroup(Source(m));
-    len := infinity;
-    twist := [];
-    repeat
-        idle := true;
-        newm := List(bgen,t->t*m);
-        newlen := List(newm,t->Sum(g,x->Length(x^t)));
-        i := Position(newlen,Minimum(newlen));
-        if newlen[i] < len then
-            len := newlen[i];
-            m := newm[i];
-            Add(twist,bgen[i]);
-            idle := false;
-        fi;
-    until idle;
-    return List(Reversed(twist),Inverse);
-end;
diff --git a/sandbox/buff.g b/sandbox/buff.g
deleted file mode 100755
index 28309d7..0000000
--- a/sandbox/buff.g
+++ /dev/null
@@ -1,1791 +0,0 @@
-#!/bin/sh
-cat > /tmp/procgroup.$$ <<EOF
-local 0
-gauss00 1 /home/laurent/.../bin64/pargap
-gauss00 1 /home/laurent/.../bin64/pargap
-gauss01 1 /home/laurent/.../bin64/pargap
-gauss01 1 /home/laurent/.../bin64/pargap
-gauss02 1 /home/laurent/.../bin64/pargap
-gauss02 1 /home/laurent/.../bin64/pargap
-gauss03 1 /home/laurent/.../bin64/pargap
-gauss03 1 /home/laurent/.../bin64/pargap
-gauss04 1 /home/laurent/.../bin64/pargap
-gauss04 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-EOF
-start=`grep -n '#G[A]P' $0 | sed 's/:.*$//g'`
-tail -n +$start $0 | pargap -r -q -p4pg /tmp/procgroup.$$ > log.$$ 2>&1
-exit
-#GAP
-################################################################
-# Compute images, in parameter space, of Misiurewicz points,
-# or of matings of Misiurewicz polynomials with rabbit/corabbit/airplane
-#
-mindenom := 8; # minimal denominator; all i/mindenom will be computed
-maxdenom := 2^14; # maximal denominator
-mindist := 1/10; # subdivide as long as denominator is small enough and
-                 # distance between neighbouring points is >mindist
-
-type := "rabbit";
-
-maxpcset := 15; # maximal number of post-critical points
-################################################################
-
-#ParReset();
-ParEval("LoadPackage(\"fr\")");
-#ParEval("SetInfoLevel(InfoFR,2)");
-ParEval("EPS@fr.maxratio := MacFloat(16/10)");
-ParEval("EPS@fr.fast := MacFloat(5)");
-
-################################################################
-ParInstallTOPCGlobalFunction("makemeone", function(mindenom,maxdenom,mindist,maxpcset,type)
-    local points, i, j, idle, c2i, i2c, obstructed, task, angle2, job, isreal;
-    
-    c2i := function(c)
-        if IsInt(c) then return c; fi;
-        return [Int(10^10*RealPart(c)),Int(10^10*ImaginaryPart(c))];
-    end;
-    i2c := function(i)
-        if IsInt(i) then return i; fi;
-        return Complex(i[1]/10^10,i[2]/10^10);
-    end;
-
-    isreal := function(angle)
-        local a, b, seen, a0, a1;
-    
-	a := angle;
-	b := 1-angle; if b=1 then b := 0; fi;
-	a0 := angle/2;
-	a1 := (angle+1)/2;
-	seen := [];
-    
-	repeat
-            Add(seen,a);
-            if not ((a0<=a and a1>=a and a0<=b and a1>=b) or
-                ((a0>a or a1<a) and (a0>b or a1<b))) then
-	        return false;
-            fi;
-            a := 2*a;
-            if a>1 then a := a-1; fi;
-            b := 2*b;
-            if b>1 then b := b-1; fi;
-	until a in seen;
-	return true;
-    end;
-
-    MakeReadWriteGlobal("ErrorInner");
-    ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-    if type="mandelbrot" then
-	task := function(angle)
-            local v;
-            v := CALL_WITH_CATCH(RationalFunction,[PolynomialIMGMachine(2,[angle],false)]:param_unicritical);
-	    if not v[1] then # gap error
-		return 1;
-	    elif IsRationalFunction(v[2]) then # z^2+c
-		return c2i(Value(v[2],0));
-	    elif IsRecord(v[2]) then # obstruction
-		return 0;
-	    else # fr error
-		return 1;
-	    fi;
-	end;
-    else # points in slice v3
-        if type="rabbit" then
-            angle2 := 1/7;
-        elif type="airplane" then
-            angle2 := 3/7;
-        elif type="corabbit" then
-            angle2 := 5/7;
-        fi;
-        obstructed := [1-angle2-1/7,1-angle2];
-        task := function(angle)
-            local v;
-	    if angle >= obstructed[1] and angle <= obstructed[2] then
-		return 0; # we know it's an obstruction
-	    fi;
-	    RUNTIME@fr := Runtime() + 3600*1000; # allow 1 hour
-            v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[angle2]))]:param_v:=3);
-	    Info(InfoFR,1,"Spider converged to ",v," on ",MPI_Comm_rank());
-            if not v[1] then
-                return 1; # gap error
-            elif IsRationalFunction(v[2]) then # 1 - (1+a)z^-1 + az^-2
-                return c2i(CoefficientsOfUnivariateLaurentPolynomial(v[2])[1][1]);
-            elif IsRecord(v[2]) then
-		return 0; # obstruction
-	    else
-                return 1; # fr error
-            fi;
-        end;
-    fi;
-
-    points := [];
-
-    job := [];
-    # classical job
-    for i in Combinations([0..maxpcset],2) do
-	j := 2^i[2]-2^i[1];
-	UniteSet(job,[0..j-1]/j);
-    od;
-
-    # Hamal Hubbard's question: only points in [2/7,1/3]
-    if false then
-	job := Filtered(job,angle->IsEvenInt(DenominatorRat(angle)) and angle >= 2/7 and angle <= 1/3);
-    fi;
-
-    # Xavier Buff's question: real polynomials with rabbit
-
-    if true then
-	job := Filtered(job,angle->angle<=1/2 and isreal(angle));
-
-    job := [ 1/3, 6755/16368, 1675/4032, 453/1088, 6815/16368,
-    533/1280, 2133/5120, 6799/16320, 3413/8191, 4547/10912,
-    4267/10240, 10241/24576, 1137/2728, 3361/8064, 13445/32256,
-    569/1364, 267/640, 10255/24576, 3415/8184, 13673/32767, 3365/8064,
-    13661/32736, 3417/8188, 643/1536, 6857/16380, 571/1364,
-    13717/32767, 911/2176, 857/2047, 6859/16380, 13721/32767,
-    4573/10920, 13709/32736, 13721/32764, 3429/8188, 1715/4092,
-    443/1057, 13519/32256, 1073/2560, 10301/24576, 4293/10240,
-    3433/8188, 6763/16128, 14627/32767, 14599/32704, 25/56,
-    14515/32512, 14629/32767, 14601/32704, 14401/32256, 12801/28672,
-    14627/32760, 10973/24576, 14629/32764, 6401/14336, 3201/7168,
-    14519/32512, 10975/24576, 14633/32767, 14605/32704, 14405/32256,
-    12805/28672, 14177/31744, 14633/32764, 14621/32736, 14521/32512,
-    6403/14336, 14635/32767, 12807/28672, 14633/32760, 14635/32764,
-    14623/32736, 14523/32512, 1601/3584, 3203/7168, 14185/31744,
-    14641/32764, 14629/32736, 12813/28672, 6407/14336, 14641/32760,
-    14643/32764, 12815/28672, 14189/31744, 14645/32764, 801/1792,
-    6409/14336, 14661/32764, 6415/14336, 401/896, 14207/31744,
-    14651/32736, 10999/24576, 14551/32512, 12833/28672, 14609/32640,
-    14663/32760, 14653/32736, 14209/31744, 6417/14336, 14667/32767,
-    12835/28672, 14667/32764, 14211/31744, 14555/32512, 3209/7168,
-    1605/3584, 14617/32640, 14671/32760, 12841/28672, 14675/32767,
-    6421/14336, 14675/32764, 14677/32767, 14563/32512, 14219/31744,
-    12843/28672, 14621/32640, 14449/32256, 11009/24576, 14677/32764,
-    3211/7168, 6423/14336, 11011/24576, 14681/32767, 14653/32704,
-    14567/32512, 12847/28672, 14453/32256, 14681/32764, 14669/32736,
-    803/1792, 14683/32767, 12849/28672, 14681/32760, 14677/32736,
-    12855/28672, 14691/32767, 1607/3584, 14689/32760, 14691/32764,
-    12857/28672, 14465/32256, 11021/24576, 14693/32764, 6429/14336,
-    3215/7168, 11023/24576, 14683/32736, 14697/32767, 14669/32704,
-    12861/28672, 14239/31744, 3671/8184, 2939/6552, 14697/32764,
-    6431/14336, 14699/32767, 12863/28672, 14471/32256, 14699/32764,
-    14687/32736, 3661/8160, 201/448, 153/341, 14677/32704, 3217/7168,
-    4883/10880, 14247/31744, 7339/16352, 14705/32764, 14503/32256,
-    14719/32736, 14273/31744, 3223/7168, 403/896, 5527/12288,
-    14509/32256, 12897/28672, 14739/32767, 2447/5440, 6449/14336,
-    1785/3968, 1839/4088, 14741/32767, 14281/31744, 12899/28672,
-    14713/32704, 907/2016, 1841/4092, 7141/15872, 3225/7168, 921/2047,
-    6451/14336, 7315/16256, 14515/32256, 12903/28672, 7143/15872,
-    4911/10912, 1613/3584, 1843/4095, 12905/28672, 983/2184,
-    12911/28672, 14755/32767, 807/1792, 1787/3968, 7375/16376,
-    7321/16256, 12913/28672, 7365/16352, 6457/14336, 14759/32764,
-    3229/7168, 14761/32767, 12917/28672, 1831/4064, 6459/14336,
-    7375/16368, 12919/28672, 7267/16128, 2307/5120, 921/2044,
-    3677/8160, 1615/3584, 2461/5460, 14763/32752, 3231/7168, 119/264,
-    12925/28672, 6463/14336, 1843/4088, 321/712, 12927/28672,
-    14767/32752, 14659/32512, 14771/32760, 14773/32764, 101/224,
-    923/2047, 6465/14336, 11083/24576, 14675/32512, 4911/10880,
-    6471/14336, 3691/8176, 809/1792, 4623/10240, 14787/32752,
-    12945/28672, 1387/3072, 7383/16352, 7397/16383, 6473/14336,
-    14795/32767, 12947/28672, 14783/32736, 3237/7168, 451/992,
-    3259/7168, 13037/28672, 6519/14336, 3667/8064, 14887/32736,
-    3609/7936, 13039/28672, 815/1792, 14903/32764, 6521/14336,
-    11179/24576, 6527/14336, 51/112, 14921/32767, 14805/32512,
-    13057/28672, 14915/32752, 7345/16128, 14457/31744, 6529/14336,
-    13059/28672, 3265/7168, 14915/32736, 1633/3584, 2333/5120,
-    13065/28672, 6533/14336, 14817/32512, 13067/28672, 3267/7168,
-    6535/14336, 14937/32767, 13071/28672, 817/1792, 7441/16320,
-    13073/28672, 1853/4064, 13079/28672, 1635/3584, 927/2032,
-    7241/15872, 13081/28672, 14943/32752, 6541/14336, 3709/8128,
-    3271/7168, 533/1168, 13085/28672, 1245/2728, 7463/16352,
-    3737/8188, 6543/14336, 13087/28672, 241/528, 933/2044, 409/896,
-    14903/32640, 3273/7168, 14729/32256, 13093/28672, 6547/14336,
-    3745/8188, 6557/14336, 14929/32640, 1815/3968, 13115/28672,
-    3279/7168, 4993/10912, 205/448, 14987/32752, 1069/2336,
-    13121/28672, 14981/32736, 6561/14336, 465/1016, 14529/31744,
-    13123/28672, 7265/15872, 3281/7168, 7485/16352, 937/2047,
-    6563/14336, 14767/32256, 14987/32736, 13127/28672, 1249/2728,
-    14999/32760, 2813/6144, 1641/3584, 13129/28672, 7495/16368,
-    1861/4064, 3751/8188, 13135/28672, 4999/10912, 821/1792, 909/1984,
-    13137/28672, 15007/32752, 625/1364, 6569/14336, 7493/16352,
-    3285/7168, 11263/24576, 15017/32767, 4693/10240, 14783/32256,
-    13141/28672, 3753/8188, 6571/14336, 14551/31744, 13143/28672,
-    7507/16376, 1643/3584, 14993/32704, 11267/24576, 3727/8128,
-    4989/10880, 3287/7168, 13149/28672, 6575/14336, 7507/16368,
-    14971/32640, 13151/28672, 15023/32752, 411/896, 1057/2304,
-    6577/14336, 2349/5120, 15019/32736, 2995/6528, 13155/28672,
-    15005/32704, 14917/32512, 13165/28672, 15039/32752, 1879/4092,
-    6583/14336, 529/1152, 823/1792, 3755/8176, 13169/28672,
-    15043/32752, 6585/14336, 13171/28672, 7409/16128, 7523/16376,
-    5013/10912, 3293/7168, 3757/8176, 3735/8128, 15043/32736,
-    1647/3584, 15051/32752, 125/272, 3763/8188, 13177/28672,
-    6589/14336, 239/520, 467/1016, 13179/28672, 14945/32512, 57/124,
-    15061/32764, 3295/7168, 7297/15872, 6591/14336, 15065/32767,
-    13183/28672, 15037/32704, 2825/6144, 15065/32764, 103/224,
-    15067/32767, 269/585, 15061/32752, 13185/28672, 2509/5456,
-    4709/10240, 1501/3264, 7299/15872, 5651/12288, 7531/16376,
-    235/511, 3767/8188, 13191/28672, 7523/16352, 15069/32752,
-    1649/3584, 15075/32764, 2827/6144, 7535/16376, 15077/32767,
-    13193/28672, 15049/32704, 14961/32512, 6597/14336, 913/1984,
-    15077/32760, 15079/32764, 3299/7168, 7537/16376, 3763/8176,
-    3741/8128, 13197/28672, 14611/31744, 707/1536, 15079/32760,
-    3767/8184, 313/680, 6599/14336, 6617/14336, 3663/7936,
-    15123/32764, 15125/32767, 13235/28672, 5037/10912, 5041/10920,
-    3309/7168, 2521/5461, 3767/8160, 6619/14336, 3775/8176,
-    13239/28672, 15101/32704, 15129/32764, 15013/32512, 1655/3584,
-    15103/32704, 13241/28672, 1681/3640, 7451/16128, 1009/2184,
-    3781/8184, 15137/32764, 13247/28672, 207/448, 329/712,
-    13249/28672, 6625/14336, 3313/7168, 7543/16320, 917/1984,
-    13253/28672, 6627/14336, 631/1365, 14675/31744, 13255/28672,
-    233/504, 7567/16368, 503/1088, 1657/3584, 3787/8191, 1879/4064,
-    15143/32752, 11365/24576, 3781/8176, 3315/7168, 15151/32760,
-    7459/16128, 13261/28672, 6631/14336, 1891/4088, 13263/28672,
-    14921/32256, 433/936, 14685/31744, 829/1792, 7579/16383,
-    6633/14336, 13267/28672, 14689/31744, 15171/32764, 13277/28672,
-    1895/4092, 6639/14336, 415/896, 11383/24576, 843/1820, 1423/3072,
-    6641/14336, 7575/16352, 13283/28672, 3321/7168, 3789/8176,
-    1661/3584, 15157/32704, 3793/8184, 13289/28672, 14713/31744,
-    6645/14336, 15189/32767, 13291/28672, 3323/7168, 7595/16383,
-    1261/2720, 7537/16256, 7589/16368, 6647/14336, 11395/24576,
-    3791/8176, 13295/28672, 831/1792, 13297/28672, 7591/16368,
-    7361/15872, 2171/4681, 13303/28672, 1663/3584, 7365/15872,
-    13305/28672, 1381/2976, 297/640, 6653/14336, 15179/32704,
-    3041/6552, 15207/32764, 3327/7168, 13309/28672, 5069/10920,
-    6655/14336, 13311/28672, 7369/15872, 13/28, 3803/8191,
-    15185/32704, 13313/28672, 13315/28672, 3329/7168, 7609/16383,
-    13317/28672, 3803/8188, 6659/14336, 13319/28672, 15215/32752,
-    1665/3584, 1667/3584, 13337/28672, 15235/32752, 15213/32704,
-    6669/14336, 15243/32767, 13339/28672, 14769/31744, 3335/7168,
-    67/144, 13341/28672, 13343/28672, 417/896, 15243/32752, 3783/8128,
-    13345/28672, 6673/14336, 3337/7168, 6675/14336, 7625/16376,
-    15257/32767, 13351/28672, 1669/3584, 13353/28672, 4769/10240,
-    15259/32764, 15261/32767, 6677/14336, 6679/14336, 13359/28672,
-    835/1792, 7627/16368, 7575/16256, 15269/32767, 13361/28672,
-    1193/2560, 11453/24576, 6681/14336, 7397/15872, 3341/7168,
-    15035/32256, 13365/28672, 3815/8184, 7637/16383, 6683/14336,
-    3817/8188, 317/680, 13367/28672, 1697/3640, 2387/5120, 7631/16368,
-    5729/12288, 1671/3584, 953/2044, 13369/28672, 13371/28672,
-    7581/16256, 3343/7168, 13373/28672, 6687/14336, 15283/32764,
-    7613/16320, 13375/28672, 11465/24576, 209/448, 955/2047,
-    15287/32764, 7637/16368, 6689/14336, 13379/28672, 15289/32764,
-    3345/7168, 3827/8128, 3375/7168, 13501/28672, 3857/8191,
-    6751/14336, 5143/10920, 211/448, 13505/28672, 1869/3968,
-    7657/16256, 6753/14336, 14471/30720, 13507/28672, 15433/32760,
-    3377/7168, 13509/28672, 7237/15360, 3619/7680, 13511/28672,
-    11581/24576, 1689/3584, 15435/32752, 15439/32760, 7601/16128,
-    13513/28672, 3859/8188, 6757/14336, 13515/28672, 7693/16320,
-    15443/32760, 3379/7168, 643/1364, 14483/30720, 6759/14336,
-    11587/24576, 1207/2560, 13519/28672, 2203/4672, 845/1792,
-    481/1020, 15445/32752, 13521/28672, 15453/32767, 6761/14336,
-    15333/32512, 3863/8191, 6763/14336, 13527/28672, 1691/3584,
-    7723/16368, 2899/6144, 13529/28672, 1929/4088, 6765/14336,
-    3383/7168, 13533/28672, 15459/32752, 725/1536, 6767/14336,
-    3865/8188, 14501/30720, 1933/4095, 13535/28672, 423/896,
-    13537/28672, 7675/16256, 7729/16368, 13539/28672, 15443/32704,
-    3385/7168, 13541/28672, 6771/14336, 15475/32764, 13543/28672,
-    1693/3584, 645/1364, 14527/30720, 1695/3584, 7745/16376,
-    13561/28672, 2573/5440, 6781/14336, 15499/32767, 1877/3968,
-    13563/28672, 3845/8128, 3391/7168, 11627/24576, 13565/28672,
-    13567/28672, 15021/31744, 53/112, 13569/28672, 6785/14336,
-    7747/16368, 15509/32767, 13571/28672, 7513/15872, 3393/7168,
-    1937/4092, 15511/32767, 6787/14336, 15271/32256, 303/640,
-    13575/28672, 1697/3584, 15515/32767, 13577/28672, 15515/32764,
-    3849/8128, 15275/32256, 6789/14336, 3637/7680, 15401/32512,
-    6791/14336, 955/2016, 5821/12288, 15493/32704, 13583/28672,
-    7277/15360, 849/1792, 15283/32256, 13585/28672, 199/420,
-    3881/8191, 6793/14336, 345/728, 3397/7168, 7757/16368,
-    13589/28672, 15527/32760, 6795/14336, 15289/32256, 647/1365,
-    15411/32512, 13591/28672, 15503/32704, 1699/3584, 15413/32512,
-    13593/28672, 13595/28672, 14567/30720, 3399/7168, 239/504,
-    13597/28672, 6799/14336, 15533/32752, 15055/31744, 7767/16376,
-    13599/28672, 15527/32736, 425/896, 15537/32752, 6801/14336,
-    13603/28672, 3879/8176, 3401/7168, 13605/28672, 13611/28672,
-    3403/7168, 15557/32767, 13613/28672, 3889/8191, 1941/4088,
-    6807/14336, 1943/4092, 15439/32512, 851/1792, 7777/16376,
-    13617/28672, 6809/14336, 13619/28672, 3405/7168, 15559/32752,
-    13621/28672, 181/381, 13623/28672, 11677/24576, 1703/3584,
-    3771/7936, 5839/12288, 2433/5120, 13625/28672, 6813/14336,
-    15451/32512, 7783/16376, 13627/28672, 3407/7168, 1945/4092,
-    6815/14336, 15091/31744, 13631/28672, 15457/32512, 213/448,
-    13633/28672, 6817/14336, 6819/14336, 3889/8176, 13639/28672,
-    1705/3584, 15467/32512, 647/1360, 13641/28672, 3867/8128,
-    6821/14336, 7309/15360, 3411/7168, 13645/28672, 6823/14336,
-    1919/4032, 13647/28672, 853/1792, 139/292, 3119/6552, 13649/28672,
-    15477/32512, 13651/28672, 15601/32767, 3413/7168, 13653/28672,
-    3779/7936, 31/65, 641/1344, 7799/16352, 13675/28672, 15385/32256,
-    3419/7168, 13677/28672, 13679/28672, 855/1792, 13681/28672,
-    14659/30720, 5207/10912, 6841/14336, 15629/32752, 1737/3640,
-    15635/32764, 649/1360, 15515/32512, 7811/16368, 733/1536,
-    15637/32767, 15607/32704, 7815/16376, 15149/31744, 13683/28672,
-    7817/16380, 3909/8191, 3879/8128, 15623/32736, 7697/16128,
-    4887/10240, 1951/4088, 15631/32752, 11729/24576, 7575/15872,
-    3127/6552, 3421/7168, 15637/32764, 7819/16383, 7789/16320,
-    15517/32512, 21/44, 15395/32256, 7331/15360, 15639/32767,
-    15609/32704, 977/2047, 1283/2688, 14663/30720, 1115/2336,
-    15633/32752, 947/1984, 15637/32760, 15639/32764, 779/1632,
-    6843/14336, 15519/32512, 7813/16368, 11731/24576, 15397/32256,
-    15641/32767, 15611/32704, 611/1280, 7817/16376, 15153/31744,
-    1117/2340, 15581/32640, 485/1016, 5209/10912, 13687/28672,
-    7699/16128, 3903/8176, 15635/32752, 2933/6144, 401/840,
-    7577/15872, 15641/32764, 2607/5461, 2597/5440, 15521/32512,
-    3907/8184, 1711/3584, 15643/32767, 15613/32704, 3909/8188,
-    7333/15360, 391/819, 7761/16256, 15629/32736, 275/576, 7807/16352,
-    13689/28672, 15637/32752, 4889/10240, 15641/32760, 3789/7936,
-    15643/32764, 487/1020, 15523/32512, 2605/5456, 5867/12288,
-    15401/32256, 2235/4681, 15615/32704, 7819/16376, 6845/14336,
-    869/1820, 3667/7680, 3911/8191, 1039/2176, 3881/8128, 1421/2976,
-    2567/5376, 15649/32767, 5135/10752, 15619/32704, 7821/16376,
-    7823/16380, 917/1920, 1941/4064, 15635/32736, 6847/14336,
-    7703/16128, 3905/8176, 15643/32752, 5869/12288, 15647/32760,
-    15649/32764, 7825/16383, 7581/15872, 1559/3264, 4891/10240,
-    15529/32512, 1303/2728, 13695/28672, 15651/32767, 2201/4608,
-    15621/32704, 3911/8188, 7337/15360, 7765/16256, 15637/32736,
-    107/224, 15645/32752, 15649/32760, 15651/32764, 1949/4080,
-    3791/7936, 7819/16368, 15531/32512, 2935/6144, 15653/32767,
-    15623/32704, 15409/32256, 7823/16376, 13697/28672, 1565/3276,
-    3913/8191, 15593/32640, 15165/31744, 5213/10912, 3883/8128,
-    1223/2560, 279/584, 7705/16128, 15647/32752, 11741/24576,
-    1739/3640, 6849/14336, 15653/32764, 2609/5461, 2599/5440,
-    7583/15872, 1955/4092, 15533/32512, 14677/30720, 505/1057,
-    15625/32704, 5137/10752, 7339/15360, 7813/16352, 3853/8064,
-    15649/32752, 15653/32760, 15655/32764, 3425/7168, 3899/8160,
-    237/496, 15535/32512, 11743/24576, 15657/32767, 15627/32704,
-    4893/10240, 7825/16376, 15413/32256, 2609/5460, 5199/10880,
-    13701/28672, 15643/32736, 15169/31744, 971/2032, 3907/8176,
-    15651/32752, 367/768, 3131/6552, 15657/32764, 7829/16383,
-    7799/16320, 3911/8184, 15537/32512, 7585/15872, 6851/14336,
-    2237/4681, 15629/32704, 3913/8188, 15415/32256, 14681/30720,
-    1957/4095, 5215/10912, 7769/16256, 15171/31744, 13703/28672,
-    7815/16352, 15653/32752, 1927/4032, 2447/5120, 5219/10920,
-    15659/32764, 65/136, 7823/16368, 5873/12288, 15539/32512,
-    3793/7936, 15661/32767, 2233/4672, 7827/16376, 1713/3584,
-    7829/16380, 14683/30720, 3915/8191, 15601/32640, 15647/32736,
-    3885/8128, 15173/31744, 977/2044, 15655/32752, 11747/24576,
-    7709/16128, 2237/4680, 13705/28672, 15661/32764, 3671/7680,
-    7831/16383, 7801/16320, 163/341, 1285/2688, 15661/32760,
-    15663/32764, 7343/15360, 13707/28672, 3901/8160, 7825/16368,
-    11749/24576, 15543/32512, 15665/32767, 1897/3968, 15635/32704,
-    7829/16376, 2203/4608, 7831/16380, 14687/30720, 3121/6528,
-    3427/7168, 5217/10912, 1943/4064, 15177/31744, 3909/8176,
-    15659/32752, 5875/12288, 7711/16128, 5221/10920, 15665/32764,
-    2611/5461, 153/320, 3913/8184, 15545/32512, 13709/28672,
-    15667/32767, 15637/32704, 7589/15872, 3915/8188, 5141/10752,
-    15607/32640, 14689/30720, 1423/2976, 7773/16256, 6855/14336,
-    1117/2336, 15179/31744, 15661/32752, 241/504, 15667/32764,
-    1951/4080, 2609/5456, 1469/3072, 15547/32512, 15669/32767,
-    15639/32704, 7831/16376, 3795/7936, 13711/28672, 373/780,
-    15425/32256, 3917/8191, 5203/10880, 505/1056, 4897/10240,
-    3887/8128, 1955/4088, 681/1424, 11753/24576, 15181/31744,
-    15667/32760, 857/1792, 15669/32764, 7835/16383, 1561/3264,
-    1957/4092, 15549/32512, 3673/7680, 15671/32767, 15641/32704,
-    11/23, 7775/16256, 14693/30720, 7821/16352, 15665/32752,
-    15183/31744, 1741/3640, 551/1152, 15671/32764, 6857/14336,
-    1301/2720, 7829/16368, 11755/24576, 15551/32512, 2239/4681,
-    2449/5120, 15643/32704, 7833/16376, 949/1984, 1567/3276,
-    5143/10752, 15613/32640, 13715/28672, 15659/32736, 243/508,
-    3911/8176, 15667/32752, 2939/6144, 15671/32760, 15185/31744,
-    15673/32764, 7715/16128, 7837/16383, 7807/16320, 1305/2728,
-    3429/7168, 15553/32512, 15675/32767, 2235/4672, 3917/8188,
-    1837/3840, 653/1365, 1041/2176, 15661/32736, 7777/16256,
-    13717/28672, 7823/16352, 15669/32752, 4899/10240, 2239/4680,
-    15187/31744, 15675/32764, 643/1344, 15679/32760, 15681/32764,
-    7841/16383, 2573/5376, 15193/31744, 4901/10240, 7811/16320,
-    3917/8184, 13723/28672, 15683/32767, 15561/32512, 15653/32704,
-    3919/8188, 919/1920, 5223/10912, 7781/16256, 3431/7168,
-    7827/16352, 15677/32752, 5227/10920, 15683/32764, 965/2016,
-    15195/31744, 651/1360, 7835/16368, 2941/6144, 15685/32767,
-    15563/32512, 15655/32704, 7839/16376, 13725/28672, 7841/16380,
-    3921/8191, 5147/10752, 3799/7936, 3125/6528, 15671/32736,
-    2451/5120, 3891/8128, 1957/4088, 15679/32752, 11765/24576,
-    15683/32760, 6863/14336, 15685/32764, 7843/16383, 1103/2304,
-    15197/31744, 7813/16320, 653/1364, 14707/30720, 2241/4681,
-    15565/32512, 15657/32704, 3677/7680, 7783/16256, 7829/16352,
-    15681/32752, 3137/6552, 15687/32764, 429/896, 3907/8160,
-    15199/31744, 7837/16368, 11767/24576, 15689/32767, 15567/32512,
-    4903/10240, 2237/4672, 7841/16376, 7843/16380, 15445/32256,
-    13729/28672, 15629/32640, 475/992, 973/2032, 3915/8176,
-    15683/32752, 1471/3072, 249/520, 15689/32764, 2615/5461,
-    7723/16128, 521/1088, 3919/8184, 15201/31744, 6865/14336,
-    15691/32767, 15569/32512, 15661/32704, 3921/8188, 14711/30720,
-    1961/4095, 5149/10752, 15631/32640, 15677/32736, 7601/15872,
-    13731/28672, 7785/16256, 7831/16352, 15685/32752, 613/1280,
-    15689/32760, 15691/32764, 1931/4032, 977/2040, 2613/5456,
-    5885/12288, 15203/31744, 15693/32767, 15571/32512, 15663/32704,
-    341/712, 3433/7168, 523/1092, 14713/30720, 3923/8191, 2207/4608,
-    5211/10880, 15679/32736, 3801/7936, 3893/8128, 979/2044,
-    15687/32752, 11771/24576, 1207/2520, 13733/28672, 15693/32764,
-    7357/15360, 7847/16383, 2575/5376, 7817/16320, 5231/10920,
-    15695/32764, 3679/7680, 13735/28672, 3863/8064, 1303/2720,
-    7841/16368, 11773/24576, 15697/32767, 15207/31744, 15575/32512,
-    15667/32704, 7845/16376, 1121/2340, 14717/30720, 1717/3584,
-    15637/32640, 15683/32736, 1901/3968, 1947/4064, 3917/8176,
-    15691/32752, 5887/12288, 3139/6552, 15697/32764, 7849/16383,
-    2453/5120, 7727/16128, 7819/16320, 1307/2728, 13737/28672,
-    15699/32767, 15209/31744, 15577/32512, 15669/32704, 3923/8188,
-    14719/30720, 15455/32256, 5213/10880, 15685/32736, 6869/14336,
-    7605/15872, 7789/16256, 7835/16352, 15693/32752, 15697/32760,
-    15699/32764, 23/48, 2243/4681, 7847/16376, 15671/32704,
-    15579/32512, 15211/31744, 13739/28672, 7849/16380, 3925/8191,
-    5229/10912, 15641/32640, 15457/32256, 4907/10240, 11777/24576,
-    15695/32752, 1959/4088, 3895/8128, 3803/7936, 5233/10920,
-    3435/7168, 15701/32764, 2617/5461, 1961/4092, 2607/5440,
-    7729/16128, 7361/15360, 15703/32767, 981/2047, 15689/32736,
-    15643/32640, 5153/10752, 14723/30720, 15697/32752, 7837/16352,
-    7791/16256, 7607/15872, 2243/4680, 15703/32764, 6871/14336,
-    11779/24576, 2615/5456, 3911/8160, 3865/8064, 15705/32767,
-    1227/2560, 7849/16376, 15675/32704, 15583/32512, 15215/31744,
-    2617/5460, 13743/28672, 15691/32736, 1043/2176, 15461/32256,
-    2945/6144, 15699/32752, 3919/8176, 487/1016, 15703/32760,
-    951/1984, 15705/32764, 7853/16383, 3923/8184, 7823/16320,
-    859/1792, 15707/32767, 3925/8188, 15677/32704, 15585/32512,
-    7363/15360, 151/315, 5231/10912, 15647/32640, 2209/4608,
-    13745/28672, 15701/32752, 7839/16352, 7793/16256, 4909/10240,
-    349/728, 7609/15872, 15707/32764, 5891/12288, 7847/16368, 163/340,
-    1933/4032, 15709/32767, 7851/16376, 15679/32704, 6873/14336,
-    15587/32512, 7853/16380, 1841/3840, 3927/8191, 15695/32736,
-    15649/32640, 5155/10752, 11783/24576, 15703/32752, 35/73,
-    11785/24576, 7849/16368, 3913/8160, 15713/32767, 1289/2688,
-    7853/16376, 15683/32704, 15591/32512, 1571/3276, 3683/7680,
-    6875/14336, 5233/10912, 15653/32640, 15469/32256, 5893/12288,
-    15707/32752, 3921/8176, 1949/4064, 5237/10920, 15713/32764,
-    2619/5461, 1903/3968, 4911/10240, 3925/8184, 2609/5440,
-    13751/28672, 2245/4681, 1105/2304, 3927/8188, 15685/32704,
-    15593/32512, 7367/15360, 15701/32736, 3131/6528, 1719/3584,
-    683/1424, 7843/16352, 7797/16256, 15713/32760, 15715/32764,
-    7613/15872, 2947/6144, 2617/5456, 1957/4080, 507/1057, 967/2016,
-    7855/16376, 2241/4672, 13753/28672, 15595/32512, 873/1820,
-    3929/8191, 15227/31744, 15703/32736, 307/640, 15473/32256,
-    11789/24576, 15711/32752, 1961/4088, 3899/8128, 449/936,
-    6877/14336, 15717/32764, 7859/16383, 3807/7936, 1963/4092,
-    7829/16320, 14737/30720, 15719/32767, 2579/5376, 5235/10912,
-    15659/32640, 7369/15360, 15475/32256, 15713/32752, 7845/16352,
-    7799/16256, 403/840, 15719/32764, 3439/7168, 7615/15872,
-    11791/24576, 7853/16368, 261/544, 15721/32767, 4913/10240,
-    3869/8064, 7857/16376, 15691/32704, 15599/32512, 7859/16380,
-    13757/28672, 15231/31744, 15707/32736, 15661/32640, 737/1536,
-    15715/32752, 3923/8176, 975/2032, 15719/32760, 15721/32764,
-    7861/16383, 119/248, 7831/16320, 6879/14336, 15723/32767,
-    3929/8188, 7739/16128, 15693/32704, 14741/30720, 131/273,
-    15709/32736, 15233/31744, 5221/10880, 13759/28672, 15717/32752,
-    15479/32256, 1121/2336, 2457/5120, 15721/32760, 7801/16256,
-    15723/32764, 5897/12288, 7855/16368, 7617/15872, 979/2040,
-    15725/32767, 7859/16376, 215/448, 1123/2340, 15603/32512,
-    14743/30720, 3931/8191, 5237/10912, 3133/6528, 15235/31744,
-    11795/24576, 15719/32752, 981/2044, 15481/32256, 1747/3640,
-    13761/28672, 3901/8128, 15725/32764, 1843/3840, 2621/5461,
-    491/1023, 15721/32752, 7849/16352, 5161/10752, 3145/6552,
-    7803/16256, 15727/32764, 7373/15360, 13763/28672, 11797/24576,
-    2619/5456, 3917/8160, 2247/4681, 7619/15872, 7861/16376,
-    15699/32704, 553/1152, 2621/5460, 15607/32512, 14747/30720,
-    3441/7168, 15715/32736, 5223/10880, 15239/31744, 5899/12288,
-    15723/32752, 3925/8176, 15485/32256, 15727/32760, 1951/4064,
-    15729/32764, 7865/16383, 1229/2560, 3929/8184, 13765/28672,
-    1567/3264, 15731/32767, 1905/3968, 3931/8188, 2243/4672,
-    2581/5376, 14749/30720, 169/352, 15671/32640, 6883/14336,
-    15241/31744, 15725/32752, 7851/16352, 15487/32256, 749/1560,
-    7805/16256, 15731/32764, 1475/3072, 7859/16368, 653/1360,
-    15733/32767, 7621/15872, 7863/16376, 13767/28672, 15703/32704,
-    121/252, 3933/8191, 1429/2976, 4917/10240, 15673/32640,
-    11801/24576, 15727/32752, 15243/31744, 1963/4088, 15731/32760,
-    1721/3584, 15733/32764, 3903/8128, 7867/16383, 655/1364, 461/960,
-    15735/32767, 983/2047, 15721/32736, 1045/2176, 14753/30720,
-    15729/32752, 7853/16352, 15245/31744, 15733/32760, 2213/4608,
-    15735/32764, 7807/16256, 6885/14336, 11803/24576, 7861/16368,
-    3919/8160, 15737/32767, 2459/5120, 7865/16376, 15707/32704,
-    7623/15872, 7867/16380, 1291/2688, 13771/28672, 5241/10912,
-    15677/32640, 2951/6144, 15731/32752, 561/1168, 15247/31744,
-    1049/2184, 15493/32256, 15737/32764, 61/127, 7813/16256,
-    15503/32256, 15257/31744, 2953/6144, 7867/16368, 15749/32767,
-    1961/4080, 7871/16376, 13781/28672, 15719/32704, 7873/16380,
-    3937/8191, 323/672, 7629/15872, 5245/10912, 2461/5120,
-    15689/32640, 11813/24576, 15743/32752, 1965/4088, 5249/10920,
-    6891/14336, 15749/32764, 2625/5461, 3907/8128, 2215/4608,
-    15259/31744, 1967/4092, 14767/30720, 15751/32767, 523/1088,
-    15737/32736, 923/1920, 15745/32752, 1123/2336, 15749/32760,
-    15751/32764, 7815/16256, 1723/3584, 15261/31744, 11815/24576,
-    2623/5456, 15753/32767, 3923/8160, 4923/10240, 7873/16376,
-    15723/32704, 25/52, 15631/32512, 3877/8064, 13785/28672,
-    7631/15872, 15739/32736, 5231/10880, 1477/3072, 15747/32752,
-    3931/8176, 15751/32760, 15753/32764, 7877/16383, 977/2032,
-    15509/32256, 15263/31744, 3935/8184, 6893/14336, 15755/32767,
-    7847/16320, 3937/8188, 14771/30720, 15725/32704, 1969/4095,
-    2585/5376, 477/992, 3139/6528, 13787/28672, 15749/32752,
-    7863/16352, 1231/2560, 5251/10920, 15755/32764, 7817/16256,
-    15511/32256, 5909/12288, 7871/16368, 15265/31744, 2251/4681,
-    327/680, 7875/16376, 3447/7168, 15727/32704, 7877/16380,
-    14773/30720, 3939/8191, 15635/32512, 277/576, 15743/32736,
-    7633/15872, 15697/32640, 11819/24576, 15751/32752, 983/2044,
-    3151/6552, 13789/28672, 15757/32764, 7387/15360, 7879/16383,
-    3909/8128, 5171/10752, 177/368, 7865/16352, 2251/4680,
-    15759/32764, 1847/3840, 7819/16256, 13791/28672, 15515/32256,
-    11821/24576, 7873/16368, 15761/32767, 15269/31744, 785/1632,
-    7877/16376, 15731/32704, 7879/16380, 14777/30720, 15639/32512,
-    431/896, 5249/10912, 15701/32640, 7635/15872, 5911/12288,
-    685/1424, 3933/8176, 1751/3640, 15761/32764, 2627/5461, 1955/4064,
-    2463/5120, 15517/32256, 127/264, 13793/28672, 15763/32767,
-    2617/5440, 15271/31744, 3939/8188, 15733/32704, 15641/32512,
-    14779/30720, 7759/16128, 15749/32736, 6897/14336, 15703/32640,
-    1909/3968, 15757/32752, 7867/16352, 15761/32760, 15763/32764,
-    7821/16256, 739/1536, 2625/5456, 15765/32767, 1963/4080,
-    15273/31744, 7879/16376, 13795/28672, 15735/32704, 2627/5460,
-    3941/8191, 15643/32512, 485/1008, 15751/32736, 4927/10240,
-    1047/2176, 11825/24576, 15759/32752, 7637/15872, 281/584,
-    15763/32760, 3449/7168, 15765/32764, 7883/16383, 3911/8128,
-    15521/32256, 179/372, 7391/15360, 15767/32767, 7853/16320,
-    985/2047, 2587/5376, 5251/10912, 14783/30720, 15707/32640,
-    15761/32752, 3819/7936, 7869/16352, 1051/2184, 15767/32764,
-    6899/14336, 7823/16256, 11827/24576, 15523/32256, 7877/16368,
-    15769/32767, 77/160, 7881/16376, 15739/32704, 15277/31744,
-    7883/16380, 15647/32512, 13799/28672, 15755/32736, 3881/8064,
-    15709/32640, 2957/6144, 15763/32752, 3935/8176, 7639/15872,
-    15767/32760, 15769/32764, 7885/16383, 489/1016, 1313/2728,
-    1725/3584, 2253/4681, 1571/3264, 3941/8188, 7393/15360,
-    15741/32704, 219/455, 15649/32512, 15757/32736, 1109/2304,
-    13801/28672, 5237/10880, 15765/32752, 4929/10240, 7871/16352,
-    1213/2520, 955/1984, 15771/32764, 7825/16256, 5915/12288,
-    7879/16368, 15527/32256, 15773/32767, 491/1020, 7883/16376,
-    6901/14336, 2249/4672, 1577/3276, 3697/7680, 3943/8191,
-    15651/32512, 5253/10912, 647/1344, 15713/32640, 11831/24576,
-    15767/32752, 7827/16256, 11833/24576, 2627/5456, 15777/32767,
-    5177/10752, 3929/8160, 7885/16376, 15747/32704, 2629/5460,
-    1849/3840, 15655/32512, 6903/14336, 1433/2976, 3883/8064,
-    5239/10880, 5917/12288, 15771/32752, 3937/8176, 3155/6552,
-    15777/32764, 7889/16383, 7643/15872, 4931/10240, 1957/4064,
-    3941/8184, 13807/28672, 509/1057, 2219/4608, 7859/16320,
-    3943/8188, 15749/32704, 7397/15360, 15657/32512, 5255/10912,
-    863/1792, 15719/32640, 15773/32752, 1125/2336, 1753/3640,
-    15779/32764, 1911/3968, 7829/16256, 2959/6144, 7883/16368,
-    15781/32767, 15535/32256, 131/272, 7887/16376, 13809/28672,
-    15751/32704, 1127/2340, 3945/8191, 15289/31744, 15659/32512,
-    1233/2560, 15767/32736, 971/2016, 15721/32640, 11837/24576,
-    15775/32752, 1969/4088, 15779/32760, 6905/14336, 15781/32764,
-    7891/16383, 7645/15872, 3915/8128, 657/1364, 14797/30720,
-    15783/32767, 5179/10752, 7861/16320, 15661/32512, 15769/32736,
-    7399/15360, 7769/16128, 5241/10880, 15777/32752, 7877/16352,
-    15781/32760, 15783/32764, 3453/7168, 3823/7936, 7831/16256,
-    11839/24576, 7885/16368, 2255/4681, 4933/10240, 15539/32256,
-    3931/8160, 343/712, 15755/32704, 607/1260, 13813/28672,
-    15293/31744, 15663/32512, 5257/10912, 185/384, 15779/32752,
-    3939/8176, 5261/10920, 15785/32764, 2631/5461, 979/2032,
-    7647/15872, 3943/8184, 6907/14336, 15787/32767, 2621/5440,
-    15541/32256, 3945/8188, 14801/30720, 2251/4672, 1973/4095,
-    15665/32512, 15295/31744, 15773/32736, 13815/28672, 15727/32640,
-    7771/16128, 15781/32752, 2467/5120, 7879/16352, 451/936,
-    15787/32764, 5921/12288, 7833/16256, 239/496, 15789/32767,
-    983/2040, 7891/16376, 1727/3584, 15759/32704, 877/1820,
-    14803/30720, 3947/8191, 15667/32512, 15775/32736, 15297/31744,
-    11843/24576, 5243/10880, 15783/32752, 1943/4032, 985/2044,
-    15787/32760, 13817/28672, 15789/32764, 3701/7680, 7895/16383,
-    3917/8128, 493/1023, 15731/32640, 15785/32752, 2591/5376,
-    7881/16352, 5263/10920, 15791/32764, 7403/15360, 13819/28672,
-    11845/24576, 7835/16256, 7889/16368, 15793/32767, 3825/7936,
-    1311/2720, 7893/16376, 2221/4608, 15763/32704, 1579/3276,
-    14807/30720, 3455/7168, 15671/32512, 509/1056, 15301/31744,
-    5923/12288, 15733/32640, 15787/32752, 3887/8064, 563/1168,
-    15791/32760, 15793/32764, 7897/16383, 617/1280, 1959/4064,
-    1315/2728, 13821/28672, 15795/32767, 7651/15872, 7867/16320,
-    3947/8188, 5183/10752, 15765/32704, 14809/30720, 15673/32512,
-    15781/32736, 6911/14336, 15303/31744, 1049/2176, 15789/32752,
-    7775/16128, 7883/16352, 15793/32760, 15795/32764, 1481/3072,
-    7837/16256, 7891/16368, 15797/32767, 1913/3968, 1967/4080,
-    7895/16376, 13823/28672, 15551/32256, 15767/32704, 7897/16380,
-    3949/8191, 4937/10240, 15675/32512, 5261/10912, 11849/24576,
-    15305/31744, 15737/32640, 15791/32752, 27/56, 15797/32764,
-    2633/5461, 1973/4092, 3919/8128, 3703/7680, 2257/4681, 987/2047,
-    1435/2976, 15677/32512, 14813/30720, 15793/32752, 15739/32640,
-    15307/31744, 15797/32760, 7885/16352, 1111/2304, 15799/32764,
-    6913/14336, 11851/24576, 2631/5456, 7839/16256, 15801/32767,
-    2469/5120, 7897/16376, 787/1632, 3827/7936, 2633/5460, 2253/4672,
-    5185/10752, 13827/28672, 15787/32736, 15679/32512, 2963/6144,
-    15795/32752, 5247/10880, 15309/31744, 2257/4680, 3943/8176,
-    3889/8064, 15801/32764, 7901/16383, 3457/7168, 3947/8184, 245/508,
-    15803/32767, 3949/8188, 463/960, 395/819, 5263/10912, 15681/32512,
-    13829/28672, 15797/32752, 15743/32640, 4939/10240, 5267/10920,
-    7887/16352, 15311/31744, 15803/32764, 2593/5376, 5927/12288,
-    7895/16368, 7841/16256, 15805/32767, 6915/14336, 7899/16376,
-    41/85, 6917/14336, 5265/10912, 15687/32512, 5929/12288,
-    15803/32752, 15749/32640, 5269/10920, 3945/8176, 15809/32764,
-    2635/5461, 1297/2688, 15317/31744, 4941/10240, 13835/28672,
-    359/744, 15811/32767, 1961/4064, 3951/8188, 525/1088, 1853/3840,
-    15797/32736, 15689/32512, 3459/7168, 15805/32752, 15751/32640,
-    15809/32760, 7891/16352, 15811/32764, 7783/16128, 15319/31744,
-    2965/6144, 2633/5456, 2259/4681, 7845/16256, 13837/28672,
-    7903/16376, 1969/4080, 527/1092, 15783/32704, 3953/8191,
-    5189/10752, 1915/3968, 2471/5120, 15799/32736, 15691/32512,
-    11861/24576, 15807/32752, 5251/10880, 6919/14336, 15811/32760,
-    1973/4088, 15813/32764, 7907/16383, 139/288, 15321/31744,
-    1975/4092, 14827/30720, 15815/32767, 3923/8128, 5267/10912,
-    3707/7680, 15693/32512, 15809/32752, 3151/6528, 251/520,
-    7893/16352, 15815/32764, 865/1792, 15323/31744, 11863/24576,
-    7901/16368, 15817/32767, 7847/16256, 4943/10240, 7905/16376,
-    1313/2720, 7907/16380, 15787/32704, 15571/32256, 13841/28672,
-    3831/7936, 15803/32736, 15695/32512, 1483/3072, 15811/32752,
-    15757/32640, 3163/6552, 3947/8176, 15817/32764, 7909/16383,
-    3893/8064, 15325/31744, 6921/14336, 1317/2728, 15819/32767,
-    981/2032, 3953/8188, 14831/30720, 7879/16320, 659/1365,
-    5191/10752, 7663/15872, 15805/32736, 13843/28672, 15697/32512,
-    15813/32752, 309/640, 15817/32760, 7895/16352, 15819/32764,
-    7787/16128, 5933/12288, 15327/31744, 7903/16368, 15821/32767,
-    7849/16256, 3461/7168, 7907/16376, 197/408, 7909/16380,
-    14833/30720, 15791/32704, 3955/8191, 2225/4608, 479/992,
-    15699/32512, 11867/24576, 15815/32752, 15761/32640, 13845/28672,
-    5273/10920, 141/292, 15821/32764, 7417/15360, 2637/5461, 649/1344,
-    15701/32512, 15817/32752, 15763/32640, 1217/2520, 7897/16352,
-    15823/32764, 3709/7680, 13847/28672, 7789/16128, 11869/24576,
-    85/176, 15825/32767, 15331/31744, 7851/16256, 7909/16376,
-    3941/8160, 879/1820, 15795/32704, 14837/30720, 1731/3584,
-    15811/32736, 3833/7936, 15703/32512, 5935/12288, 15819/32752,
-    1051/2176, 15823/32760, 3949/8176, 15825/32764, 7913/16383,
-    2473/5120, 3895/8064, 13849/28672, 3953/8184, 2261/4681,
-    15333/31744, 1963/4064, 3955/8188, 7883/16320, 14839/30720,
-    15581/32256, 5271/10912, 6925/14336, 7667/15872, 15705/32512,
-    15821/32752, 15767/32640, 1055/2184, 7899/16352, 15827/32764,
-    371/768, 7907/16368, 15829/32767, 7853/16256, 15335/31744,
-    13851/28672, 7911/16376, 657/1360, 7913/16380, 2257/4672,
-    3957/8191, 15583/32256, 4947/10240, 15815/32736, 11873/24576,
-    15707/32512, 1917/3968, 15823/32752, 15769/32640, 3463/7168,
-    2261/4680, 1975/4088, 15829/32764, 7915/16383, 487/1008, 659/1364,
-    7421/15360, 15831/32767, 3927/8128, 43/89, 5195/10752,
-    15817/32736, 14843/30720, 15709/32512, 15825/32752, 7669/15872,
-    5257/10880, 15829/32760, 7901/16352, 15831/32764, 6927/14336,
-    11875/24576, 7793/16128, 719/1488, 15833/32767, 1237/2560,
-    7855/16256, 7913/16376, 15339/31744, 3943/8160, 1583/3276,
-    15803/32704, 13855/28672, 15587/32256, 5273/10912, 2969/6144,
-    15711/32512, 15827/32752, 3835/7936, 15773/32640, 1759/3640,
-    3951/8176, 15833/32764, 2639/5461, 433/896, 3955/8184,
-    15835/32767, 491/1016, 3957/8188, 7423/15360, 2629/5440,
-    1979/4095, 2227/4608, 15821/32736, 13857/28672, 15713/32512,
-    15829/32752, 4949/10240, 3155/6528, 15833/32760, 7671/15872,
-    1129/2336, 15835/32764, 5939/12288, 7795/16128, 2637/5456,
-    15837/32767, 6929/14336, 7857/16256, 7915/16376, 29/60, 3959/8191,
-    15823/32736, 5197/10752, 11879/24576, 15831/32752, 15715/32512,
-    13859/28672, 3167/6552, 5259/10880, 14849/30720, 15837/32764,
-    247/511, 14851/30720, 13861/28672, 11881/24576, 7913/16368,
-    73/151, 2599/5376, 7917/16376, 7859/16256, 7919/16380, 263/544,
-    3713/7680, 6931/14336, 15827/32736, 15595/32256, 5941/12288,
-    15835/32752, 15719/32512, 15839/32760, 15781/32640, 15841/32764,
-    3953/8176, 7921/16383, 3837/7936, 4951/10240, 13863/28672,
-    1319/2728, 15843/32767, 557/1152, 3959/8188, 1965/4064,
-    7427/15360, 1439/2976, 1733/3584, 15837/32752, 15721/32512,
-    2263/4680, 5261/10880, 15843/32764, 7907/16352, 7675/15872,
-    2971/6144, 7915/16368, 15845/32767, 7799/16128, 13865/28672,
-    7919/16376, 7861/16256, 7921/16380, 1973/4080, 3961/8191,
-    15351/31744, 619/1280, 5277/10912, 15599/32256, 11885/24576,
-    15839/32752, 15723/32512, 6933/14336, 5281/10920, 3157/6528,
-    15845/32764, 1977/4088, 2641/5461, 1919/3968, 14857/30720,
-    1979/4092, 15847/32767, 325/672, 15833/32736, 7429/15360,
-    15601/32256, 15841/32752, 15725/32512, 3169/6552, 15787/32640,
-    15847/32764, 7909/16352, 3467/7168, 7677/15872, 11887/24576,
-    2639/5456, 15849/32767, 4953/10240, 7801/16128, 89/184,
-    7863/16256, 2641/5460, 3947/8160, 13869/28672, 15355/31744,
-    15835/32736, 743/1536, 15843/32752, 15727/32512, 1219/2520,
-    5263/10880, 15849/32764, 565/1168, 7925/16383, 3839/7936,
-    6935/14336, 3959/8184, 15851/32767, 3901/8064, 14861/30720,
-    3961/8188, 983/2032, 283/585, 15357/31744, 5279/10912,
-    13871/28672, 15605/32256, 15845/32752, 2477/5120, 15729/32512,
-    1761/3640, 15791/32640, 15851/32764, 7911/16352, 5945/12288,
-    7679/15872, 7919/16368, 15853/32767, 867/1792, 7923/16376,
-    7865/16256, 14863/30720, 1585/3276, 329/680, 3963/8191,
-    15359/31744, 15839/32736, 11891/24576, 15607/32256, 689/1424,
-    13873/28672, 15731/32512, 15851/32760, 929/1920, 15853/32764,
-    989/2044, 7927/16383, 15/31, 481/992, 15881/32752, 353/728,
-    15887/32764, 7929/16352, 931/1920, 15765/32512, 13903/28672,
-    15641/32256, 11917/24576, 15889/32767, 7937/16368, 15393/31744,
-    7941/16376, 611/1260, 1319/2720, 14897/30720, 7883/16256,
-    869/1792, 15875/32736, 7697/15872, 5959/12288, 15883/32752,
-    15887/32760, 15889/32764, 7945/16383, 3965/8176, 15829/32640,
-    15767/32512, 2483/5120, 15643/32256, 13905/28672, 15891/32767,
-    1323/2728, 15395/31744, 3971/8188, 1971/4064, 14899/30720,
-    3911/8064, 15877/32736, 6953/14336, 3849/7936, 15885/32752,
-    15889/32760, 15891/32764, 1133/2336, 5277/10880, 15769/32512,
-    745/1536, 15893/32767, 7939/16368, 15397/31744, 13907/28672,
-    7943/16376, 227/468, 3973/8191, 1979/4080, 7885/16256, 7823/16128,
-    4967/10240, 5293/10912, 11921/24576, 7699/15872, 15887/32752,
-    3477/7168, 5297/10920, 15893/32764, 2649/5461, 1983/4088,
-    15833/32640, 15771/32512, 15647/32256, 7451/15360, 15895/32767,
-    1985/4092, 15399/31744, 993/2047, 163/336, 15881/32736,
-    14903/30720, 15889/32752, 1925/3968, 15893/32760, 15895/32764,
-    7933/16352, 3167/6528, 6955/14336, 15773/32512, 11923/24576,
-    15649/32256, 2271/4681, 2647/5456, 621/1280, 7945/16376,
-    15401/31744, 883/1820, 3959/8160, 7887/16256, 13911/28672,
-    7825/16128, 15883/32736, 2981/6144, 15891/32752, 7701/15872,
-    3179/6552, 15897/32764, 7949/16383, 3967/8176, 5279/10880,
-    15775/32512, 1739/3584, 15899/32767, 361/744, 7453/15360,
-    3973/8188, 15403/31744, 1987/4095, 493/1016, 559/1152, 5295/10912,
-    13913/28672, 691/1424, 4969/10240, 757/1560, 3851/7936,
-    15899/32764, 7935/16352, 15839/32640, 15777/32512, 5963/12288,
-    15653/32256, 15901/32767, 7943/16368, 6957/14336, 7947/16376,
-    3727/7680, 7949/16380, 15405/31744, 3975/8191, 33/68, 7889/16256,
-    2609/5376, 15887/32736, 11927/24576, 15895/32752, 13915/28672,
-    1223/2520, 14909/30720, 15901/32764, 7703/15872, 7951/16383,
-    15903/32764, 963/1984, 7937/16352, 14911/30720, 5281/10880,
-    13917/28672, 15781/32512, 11929/24576, 15905/32767, 5219/10752,
-    7945/16368, 7949/16376, 7951/16380, 15409/31744, 15875/32704,
-    233/480, 7891/16256, 6959/14336, 5297/10912, 7829/16128,
-    5965/12288, 15899/32752, 1767/3640, 15905/32764, 2651/5461,
-    567/1168, 7705/15872, 3169/6528, 4971/10240, 15783/32512,
-    13919/28672, 15907/32767, 3973/8184, 2237/4608, 3975/8188,
-    15411/31744, 2641/5440, 7457/15360, 1973/4064, 15893/32736,
-    435/896, 15901/32752, 3181/6552, 15907/32764, 7939/16352,
-    15847/32640, 3853/7936, 15785/32512, 2983/6144, 15909/32767,
-    2649/5456, 15661/32256, 13921/28672, 7951/16376, 2651/5460,
-    3977/8191, 15879/32704, 1981/4080, 15413/31744, 7893/16256,
-    1243/2560, 1445/2976, 7831/16128, 11933/24576, 15903/32752,
-    6961/14336, 15907/32760, 15909/32764, 185/381, 1985/4088,
-    5283/10880, 7707/15872, 15787/32512, 14917/30720, 2273/4681,
-    1987/4092, 5221/10752, 15415/31744, 3947/8128, 7459/15360,
-    5299/10912, 979/2016, 15905/32752, 5303/10920, 15911/32764,
-    7941/16352, 3481/7168, 15851/32640, 1927/3968, 15789/32512,
-    11935/24576, 15913/32767, 7949/16368, 4973/10240, 15665/32256,
-    7953/16376, 1591/3276, 2269/4672, 1321/2720, 13925/28672,
-    15417/31744, 7895/16256, 15899/32736, 373/768, 15907/32752,
-    2273/4680, 15913/32764, 7957/16383, 3971/8176, 15853/32640,
-    15791/32512, 7709/15872, 6963/14336, 15915/32767, 1325/2728,
-    15667/32256, 14921/30720, 3977/8188, 17/35, 7927/16320, 987/2032,
-    15419/31744, 15901/32736, 13927/28672, 3917/8064, 15909/32752,
-    2487/5120, 15913/32760, 15915/32764, 7943/16352, 1057/2176,
-    5969/12288, 15793/32512, 3855/7936, 15917/32767, 7951/16368,
-    1741/3584, 7955/16376, 14923/30720, 7957/16380, 3979/8191,
-    15887/32704, 991/2040, 7897/16256, 15421/31744, 171/352,
-    11939/24576, 7835/16128, 15911/32752, 13929/28672, 1061/2184,
-    3731/7680, 15917/32764, 2653/5461, 993/2044, 15857/32640,
-    15795/32512, 7711/15872, 15919/32767, 497/1023, 15423/31744,
-    15905/32736, 653/1344, 15913/32752, 15917/32760, 15919/32764,
-    7463/15360, 1135/2336, 13931/28672, 15859/32640, 11941/24576,
-    15797/32512, 15921/32767, 241/496, 7957/16376, 2239/4608, 379/780,
-    15891/32704, 14927/30720, 793/1632, 3483/7168, 7899/16256,
-    15907/32736, 15425/31744, 5971/12288, 15915/32752, 7837/16128,
-    15919/32760, 15921/32764, 7961/16383, 3973/8176, 311/640,
-    15799/32512, 13933/28672, 15923/32767, 3977/8184, 7713/15872,
-    173/356, 5225/10752, 7931/16320, 14929/30720, 1975/4064,
-    5303/10912, 6967/14336, 15427/31744, 15917/32752, 3919/8064,
-    1769/3640, 15923/32764, 7947/16352, 15863/32640, 1493/3072,
-    15801/32512, 2275/4681, 7955/16368, 3857/7936, 13935/28672,
-    7959/16376, 15677/32256, 7961/16380, 3981/8191, 15895/32704,
-    661/1360, 4977/10240, 7901/16256, 15911/32736, 11945/24576,
-    15429/31744, 15919/32752, 871/1792, 15923/32760, 15925/32764,
-    7963/16383, 1987/4088, 3173/6528, 15803/32512, 3733/7680,
-    15927/32767, 663/1364, 7715/15872, 995/2047, 3951/8128,
-    14933/30720, 15913/32736, 15431/31744, 15921/32752, 35/72,
-    15927/32764, 7949/16352, 6969/14336, 5289/10880, 11947/24576,
-    15805/32512, 15929/32767, 7957/16368, 2489/5120, 7961/16376,
-    1929/3968, 7963/16380, 5227/10752, 15899/32704, 3967/8160,
-    13939/28672, 7903/16256, 5305/10912, 2987/6144, 15923/32752,
-    15433/31744, 5309/10920, 7841/16128, 15929/32764, 2655/5461,
-    3975/8176, 15869/32640, 3485/7168, 15807/32512, 15931/32767,
-    3979/8184, 1867/3840, 3981/8188, 7717/15872, 1991/4095,
-    15901/32704, 529/1088, 247/508, 1447/2976, 13941/28672,
-    15925/32752, 4979/10240, 15929/32760, 15435/31744, 15931/32764,
-    1307/2688, 7951/16352, 15871/32640, 5975/12288, 15809/32512,
-    15933/32767, 2653/5456, 6971/14336, 7963/16376, 7469/15360,
-    177/364, 3859/7936, 3983/8191, 15903/32704, 7965/16376,
-    7967/16380, 965/1984, 15907/32704, 7471/15360, 1323/2720,
-    6973/14336, 7907/16256, 15923/32736, 5977/12288, 179/368,
-    3187/6552, 15937/32764, 7969/16383, 2615/5376, 15441/31744,
-    3977/8176, 4981/10240, 15877/32640, 13947/28672, 2277/4681,
-    15815/32512, 1327/2728, 3983/8188, 7721/15872, 15909/32704,
-    467/960, 1977/4064, 15925/32736, 3487/7168, 15933/32752,
-    15937/32760, 15939/32764, 3923/8064, 7955/16352, 15443/31744,
-    5293/10880, 2989/6144, 15941/32767, 15817/32512, 7963/16368,
-    13949/28672, 7967/16376, 613/1260, 3985/8191, 5231/10752,
-    2273/4672, 3861/7936, 397/816, 2491/5120, 7909/16256, 5309/10912,
-    11957/24576, 15935/32752, 6975/14336, 253/520, 15941/32764,
-    2657/5461, 1121/2304, 1989/4088, 15445/31744, 15881/32640,
-    14947/30720, 15943/32767, 15819/32512, 181/372, 7723/15872,
-    2647/5440, 3737/7680, 3955/8128, 15929/32736, 15937/32752,
-    15941/32760, 15943/32764, 109/224, 15883/32640, 15447/31744,
-    11959/24576, 15945/32767, 2655/5456, 15821/32512, 4983/10240,
-    7969/16376, 2657/5460, 15915/32704, 15697/32256, 13953/28672,
-    3971/8160, 1931/3968, 15931/32736, 7911/16256, 1495/3072,
-    693/1424, 15943/32760, 15945/32764, 7973/16383, 3979/8176,
-    7849/16128, 1059/2176, 15449/31744, 6977/14336, 15947/32767,
-    3983/8184, 15823/32512, 14951/30720, 3985/8188, 1993/4095,
-    15917/32704, 5233/10752, 7943/16320, 7725/15872, 13955/28672,
-    5311/10912, 989/2032, 15941/32752, 623/1280, 1063/2184,
-    15947/32764, 1137/2336, 3925/8064, 15887/32640, 5981/12288,
-    15451/31744, 15949/32767, 257/528, 15825/32512, 3489/7168,
-    7971/16376, 14953/30720, 1139/2340, 3987/8191, 15919/32704,
-    2243/4608, 331/680, 3863/7936, 15935/32736, 7913/16256,
-    11963/24576, 15943/32752, 13957/28672, 15947/32760, 7477/15360,
-    15949/32764, 7975/16383, 995/2044, 2617/5376, 15889/32640,
-    15453/31744, 15951/32767, 7727/15872, 15937/32736, 3957/8128,
-    15945/32752, 15949/32760, 15951/32764, 3739/7680, 13959/28672,
-    7961/16352, 1963/4032, 5297/10880, 11965/24576, 2279/4681,
-    15455/31744, 7969/16368, 15829/32512, 7973/16376, 1595/3276,
-    14957/30720, 15923/32704, 1745/3584, 3973/8160, 483/992,
-    7915/16256, 5983/12288, 15947/32752, 409/840, 15953/32764,
-    2659/5461, 3981/8176, 2493/5120, 7853/16128, 15893/32640,
-    13961/28672, 15955/32767, 3985/8184, 15457/31744, 15831/32512,
-    3987/8188, 2275/4672, 14959/30720, 15707/32256, 2649/5440,
-    6981/14336, 15941/32736, 7729/15872, 1979/4064, 15949/32752,
-    2279/4680, 15955/32764, 7963/16352, 187/384, 15957/32767,
-    2657/5456, 15833/32512, 15459/31744, 13963/28672, 7975/16376,
-    2659/5460, 3989/8191, 15927/32704, 1987/4080, 15709/32256,
-    4987/10240, 15943/32736, 11969/24576, 7917/16256, 3865/7936,
-    15951/32752, 3491/7168, 3191/6552, 15957/32764, 7979/16383,
-    1991/4088, 5299/10880, 7855/16128, 7481/15360, 15959/32767,
-    1993/4092, 15835/32512, 15461/31744, 997/2047, 7949/16320,
-    5237/10752, 14963/30720, 5315/10912, 3959/8128, 7731/15872,
-    15953/32752, 1773/3640, 15959/32764, 6983/14336, 7965/16352,
-    11971/24576, 15899/32640, 491/1008, 15961/32767, 7973/16368,
-    1247/2560, 15837/32512, 7977/16376, 15463/31744, 7979/16380,
-    15931/32704, 13967/28672, 265/544, 15713/32256, 15947/32736,
-    2993/6144, 7919/16256, 15955/32752, 1933/3968, 15959/32760,
-    15961/32764, 7981/16383, 569/1168, 15901/32640, 873/1792,
-    15963/32767, 1329/2728, 15839/32512, 7483/15360, 3989/8188,
-    15465/31744, 19/39, 15933/32704, 7951/16320, 2245/4608,
-    13969/28672, 15949/32736, 495/1016, 15957/32752, 4989/10240,
-    15961/32760, 7733/15872, 15963/32764, 7967/16352, 5987/12288,
-    5301/10880, 3929/8064, 515/1057, 725/1488, 6985/14336,
-    15841/32512, 7979/16376, 1871/3840, 7981/16380, 15467/31744,
-    3991/8191, 15935/32704, 497/1020, 5239/10752, 5317/10912,
-    11975/24576, 7921/16256, 15959/32752, 13971/28672, 5321/10920,
-    14969/30720, 15965/32764, 3867/7936, 2661/5461, 249/511,
-    3193/6552, 15967/32764, 7735/15872, 14971/30720, 13973/28672,
-    7969/16352, 11977/24576, 15907/32640, 15969/32767, 655/1344,
-    2659/5456, 15845/32512, 347/712, 887/1820, 15471/31744, 3743/7680,
-    2277/4672, 6987/14336, 3977/8160, 15721/32256, 15955/32736,
-    5989/12288, 7923/16256, 15963/32752, 2281/4680, 15969/32764,
-    7985/16383, 967/1984, 3985/8176, 4991/10240, 5303/10880,
-    13975/28672, 15971/32767, 1123/2304, 3989/8184, 15847/32512,
-    3991/8188, 15473/31744, 15941/32704, 7487/15360, 1591/3264,
-    1747/3584, 5319/10912, 1981/4064, 15965/32752, 5323/10920,
-    15971/32764, 7737/15872, 7971/16352, 2995/6144, 15911/32640,
-    15973/32767, 3931/8064, 7979/16368, 13977/28672, 15849/32512,
-    7983/16376, 1597/3276, 3993/8191, 15475/31744, 15943/32704, 39/80,
-    15959/32736, 15725/32256, 11981/24576, 15967/32752, 7925/16256,
-    6989/14336, 15971/32760, 15973/32764, 7987/16383, 1993/4088,
-    3869/7936, 15913/32640, 14977/30720, 15975/32767, 665/1364,
-    2621/5376, 15945/32704, 15477/31744, 7957/16320, 7489/15360,
-    1451/2976, 15727/32256, 15969/32752, 3963/8128, 15973/32760,
-    15975/32764, 3495/7168, 1139/2336, 7739/15872, 11983/24576,
-    1061/2176, 15977/32767, 4993/10240, 7981/16368, 983/2016,
-    7985/16376, 15853/32512, 1141/2340, 15947/32704, 13981/28672,
-    15479/31744, 3979/8160, 5321/10912, 749/1536, 15971/32752,
-    7927/16256, 355/728, 15977/32764, 2663/5461, 3987/8176, 1935/3968,
-    15917/32640, 6991/14336, 15979/32767, 3991/8184, 7865/16128,
-    14981/30720, 3993/8188, 15855/32512, 1997/4095, 15949/32704,
-    15481/31744, 2653/5440, 13983/28672, 515/1056, 15731/32256,
-    2497/5120, 15973/32752, 991/2032, 1229/2520, 15979/32764,
-    7975/16352, 5993/12288, 7741/15872, 15919/32640, 2283/4681,
-    2661/5456, 437/896, 7987/16376, 15857/32512, 14983/30720,
-    2663/5460, 3995/8191, 15951/32704, 199/408, 15483/31744,
-    15967/32736, 11987/24576, 15733/32256, 15975/32752, 13985/28672,
-    7929/16256, 15979/32760, 1873/3840, 15981/32764, 7991/16383,
-    997/2044, 5307/10880, 3871/7936, 15983/32767, 499/1023,
-    7961/16320, 15485/31744, 5323/10912, 5245/10752, 15977/32752,
-    3965/8128, 761/1560, 15983/32764, 7493/15360, 13987/28672,
-    7977/16352, 11989/24576, 15923/32640, 15985/32767, 7743/15872,
-    7985/16368, 281/576, 7989/16376, 15861/32512, 7991/16380,
-    14987/30720, 15955/32704, 3497/7168, 1327/2720, 15487/31744,
-    15971/32736, 5995/12288, 15737/32256, 15979/32752, 7931/16256,
-    15983/32760, 15985/32764, 7993/16383, 1249/2560, 3989/8176,
-    13989/28672, 3185/6528, 15987/32767, 121/248, 3995/8188,
-    2623/5376, 15957/32704, 14989/30720, 7963/16320, 6995/14336,
-    15973/32736, 15489/31744, 15981/32752, 15739/32256, 3197/6552,
-    1983/4064, 15987/32764, 7979/16352, 1499/3072, 5309/10880,
-    15989/32767, 7987/16368, 7745/15872, 13991/28672, 7991/16376,
-    3935/8064, 7993/16380, 15865/32512, 3997/8191, 15959/32704,
-    4997/10240, 1991/4080, 5325/10912, 11993/24576, 15491/31744,
-    15983/32752, 1749/3584, 5329/10920, 7933/16256, 15989/32764,
-    2665/5461, 285/584, 937/1920, 15991/32767, 1997/4092, 3873/7936,
-    999/2047, 15961/32704, 531/1088, 14993/30720, 15977/32736,
-    15493/31744, 695/1424, 2249/4608, 15989/32760, 3967/8128,
-    15991/32764, 6997/14336, 7981/16352, 11995/24576, 15931/32640,
-    15993/32767, 2499/5120, 2663/5456, 7747/15872, 7993/16376, 41/84,
-    15963/32704, 13995/28672, 3983/8160, 15979/32736, 2999/6144,
-    15987/32752, 15495/31744, 15991/32760, 15745/32256, 15993/32764,
-    7935/16256, 7997/16383, 3991/8176, 3499/7168, 5311/10880,
-    2285/4681, 3995/8184, 3749/7680, 3997/8188, 1937/3968, 1999/4095,
-    15965/32704, 7967/16320, 13997/28672, 5327/10912, 4999/10240,
-    15989/32752, 15497/31744, 1777/3640, 5249/10752, 15995/32764,
-    21/43, 7939/16256, 5251/10752, 15503/31744, 5001/10240, 3993/8176,
-    14003/28672, 16003/32767, 15941/32640, 3997/8184, 3999/8188,
-    969/1984, 15973/32704, 3751/7680, 2657/5440, 3501/7168,
-    15989/32736, 15997/32752, 16001/32760, 16003/32764, 1985/4064,
-    15755/32256, 15505/31744, 1141/2336, 3001/6144, 16005/32767,
-    15943/32640, 2665/5456, 14005/28672, 7999/16376, 127/260,
-    4001/8191, 15881/32512, 1313/2688, 7753/15872, 15975/32704,
-    2501/5120, 1993/4080, 15991/32736, 12005/24576, 15999/32752,
-    7003/14336, 1231/2520, 16005/32764, 8003/16383, 7941/16256,
-    2251/4608, 15507/31744, 1997/4088, 15007/30720, 16007/32767,
-    1063/2176, 1999/4092, 3877/7936, 15977/32704, 469/960, 5331/10912,
-    16001/32752, 1067/2184, 16007/32764, 3971/8128, 1751/3584,
-    7989/16352, 15509/31744, 12007/24576, 2287/4681, 15947/32640,
-    5003/10240, 727/1488, 8001/16376, 8003/16380, 15885/32512,
-    985/2016, 15979/32704, 14009/28672, 7755/15872, 1329/2720,
-    15995/32736, 1501/3072, 16003/32752, 16007/32760, 16009/32764,
-    8005/16383, 7943/16256, 15761/32256, 3995/8176, 15511/31744,
-    7005/14336, 16011/32767, 15949/32640, 43/88, 15011/30720,
-    4001/8188, 667/1365, 15887/32512, 2627/5376, 2283/4672, 1939/3968,
-    1595/3264, 14011/28672, 15997/32736, 1251/2560, 16005/32752,
-    2287/4680, 16011/32764, 993/2032, 15763/32256, 7991/16352,
-    6005/12288, 15513/31744, 16013/32767, 5317/10880, 7999/16368,
-    3503/7168, 8003/16376, 15013/30720, 1601/3276, 4003/8191,
-    15889/32512, 563/1152, 15983/32704, 7757/15872, 997/2040,
-    5333/10912, 12011/24576, 16007/32752, 14013/28672, 1779/3640,
-    7507/15360, 16013/32764, 2669/5461, 7945/16256, 5255/10752,
-    999/2044, 15515/31744, 16015/32767, 15953/32640, 3879/7936,
-    2659/5440, 16001/32736, 16009/32752, 16013/32760, 16015/32764,
-    1877/3840, 3973/8128, 14015/28672, 15767/32256, 7993/16352,
-    12013/24576, 16017/32767, 15517/31744, 3191/6528, 2667/5456,
-    8005/16376, 2669/5460, 15017/30720, 15893/32512, 219/448,
-    3989/8160, 7759/15872, 16003/32736, 6007/12288, 16011/32752,
-    3203/6552, 16017/32764, 8009/16383, 7947/16256, 2503/5120,
-    571/1168, 15769/32256, 14017/28672, 16019/32767, 5319/10880,
-    15519/31744, 4001/8184, 4003/8188, 15895/32512, 15019/30720,
-    15989/32704, 7885/16128, 7009/14336, 7979/16320, 485/992,
-    16013/32752, 5339/10920, 16019/32764, 1987/4064, 7995/16352,
-    751/1536, 16021/32767, 15959/32640, 8003/16368, 15521/31744,
-    14019/28672, 8007/16376, 8009/16380, 4005/8191, 15897/32512,
-    15991/32704, 3943/8064, 5007/10240, 133/272, 16007/32736,
-    12017/24576, 7761/15872, 16015/32752, 3505/7168, 16019/32760,
-    16021/32764, 8011/16383, 7949/16256, 1999/4088, 15773/32256,
-    7511/15360, 2289/4681, 15961/32640, 667/1364, 15523/31744,
-    1001/2047, 15899/32512, 15993/32704, 2629/5376, 15023/30720,
-    7981/16320, 16009/32736, 3881/7936, 16017/32752, 16021/32760,
-    16023/32764, 7011/14336, 3975/8128, 7997/16352, 12019/24576,
-    15775/32256, 16025/32767, 313/640, 8005/16368, 15525/31744,
-    8009/16376, 8011/16380, 15901/32512, 14023/28672, 2285/4672,
-    493/1008, 3991/8160, 5337/10912, 3005/6144, 16019/32752,
-    7763/15872, 763/1560, 16025/32764, 2671/5461, 7951/16256,
-    3999/8176, 1753/3584, 517/1057, 3193/6528, 4003/8184, 7513/15360,
-    45/92, 15527/31744, 2003/4095, 15903/32512, 15997/32704,
-    1127/2304, 14025/28672, 2661/5440, 16013/32736, 5009/10240,
-    16021/32752, 1941/3968, 3205/6552, 16027/32764, 497/1016,
-    7999/16352, 6011/12288, 15779/32256, 16029/32767, 15967/32640,
-    2669/5456, 7013/14336, 8011/16376, 3757/7680, 2671/5460,
-    15529/31744, 4007/8191, 15905/32512, 15999/32704, 1315/2688,
-    499/1020, 16015/32736, 12023/24576, 16023/32752, 14027/28672,
-    16027/32760, 15029/30720, 16029/32764, 7765/15872, 8015/16383,
-    7953/16256, 16025/32752, 137/280, 16031/32764, 3883/7936,
-    15031/30720, 14029/28672, 3977/8128, 1143/2336, 12025/24576,
-    16033/32767, 5261/10752, 15971/32640, 8009/16368, 8013/16376,
-    229/468, 15533/31744, 1879/3840, 15909/32512, 7015/14336,
-    16003/32704, 1973/4032, 1331/2720, 16019/32736, 6013/12288,
-    16027/32752, 16031/32760, 16033/32764, 8017/16383, 7767/15872,
-    5011/10240, 7955/16256, 4001/8176, 14031/28672, 16035/32767,
-    2255/4608, 15973/32640, 1335/2728, 4007/8188, 15535/31744,
-    7517/15360, 15911/32512, 16005/32704, 877/1792, 7987/16320,
-    16021/32736, 16029/32752, 16033/32760, 16035/32764, 971/1984,
-    1989/4064, 8003/16352, 3007/6144, 2291/4681, 15787/32256,
-    1065/2176, 8011/16368, 14033/28672, 8015/16376, 8017/16380,
-    4009/8191, 15537/31744, 15913/32512, 16007/32704, 1253/2560,
-    3947/8064, 1997/4080, 5341/10912, 12029/24576, 697/1424,
-    7017/14336, 1069/2184, 16037/32764, 2673/5461, 7769/15872,
-    7957/16256, 2001/4088, 15037/30720, 16039/32767, 5263/10752,
-    15977/32640, 2003/4092, 15539/31744, 15915/32512, 2287/4672,
-    7519/15360, 7895/16128, 2663/5440, 16025/32736, 16033/32752,
-    2291/4680, 16039/32764, 3509/7168, 3885/7936, 3979/8128,
-    8005/16352, 12031/24576, 16041/32767, 5013/10240, 15791/32256,
-    15979/32640, 2671/5456, 8017/16376, 891/1820, 14037/28672,
-    15541/31744, 15917/32512, 16011/32704, 47/96, 16035/32752,
-    16039/32760, 16041/32764, 8021/16383, 4003/8176, 7959/16256,
-    7771/15872, 7019/14336, 16043/32767, 4007/8184, 5327/10880,
-    15793/32256, 15041/30720, 4009/8188, 401/819, 16013/32704,
-    15919/32512, 15543/31744, 14039/28672, 5343/10912, 7991/16320,
-    7897/16128, 2507/5120, 16037/32752, 5347/10920, 16043/32764,
-    6017/12288, 8007/16352, 995/2032, 1943/3968, 16045/32767,
-    8015/16368, 15983/32640, 1755/3584, 8019/16376, 15043/30720,
-    617/1260, 4011/8191, 16015/32704, 15921/32512, 15545/31744,
-    12035/24576, 16031/32736, 333/680, 3949/8064, 16039/32752,
-    14041/28672, 16043/32760, 3761/7680, 16045/32764, 8023/16383,
-    143/292, 7961/16256, 7773/15872, 16047/32767, 167/341,
-    16017/32704, 15923/32512, 15547/31744, 16033/32736, 7993/16320,
-    2633/5376, 16041/32752, 3209/6552, 16047/32764, 7523/15360,
-    14043/28672, 12037/24576, 8009/16352, 3981/8128, 16049/32767,
-    3887/7936, 8017/16368, 5329/10880, 2257/4608, 8021/16376,
-    8023/16380, 15047/30720, 3511/7168, 16019/32704, 15925/32512,
-    15549/31744, 6019/12288, 5345/10912, 3997/8160, 1975/4032,
-    16043/32752, 1783/3640, 16049/32764, 2675/5461, 627/1280,
-    4005/8176, 7963/16256, 14045/28672, 2293/4681, 7775/15872,
-    4009/8184, 15989/32640, 5267/10752, 4011/8188, 15049/30720,
-    16021/32704, 15927/32512, 7023/14336, 15551/31744, 16037/32736,
-    533/1088, 7901/16128, 16045/32752, 16049/32760, 16051/32764,
-    1505/3072, 8011/16352, 1991/4064, 16053/32767, 243/496,
-    15991/32640, 14047/28672, 8023/16376, 15803/32256, 535/1092,
-    4013/8191, 2289/4672, 5017/10240, 15929/32512, 12041/24576,
-    16039/32736, 15553/31744, 1999/4080, 16047/32752, 439/896,
-    2293/4680, 16053/32764, 8027/16383, 2003/4088, 7965/16256,
-    3763/7680, 16055/32767, 2005/4092, 5331/10880, 7777/15872,
-    1003/2047, 16025/32704, 15931/32512, 15053/30720, 5347/10912,
-    7997/16320, 15555/31744, 16049/32752, 1129/2304, 5351/10920,
-    16055/32764, 7025/14336, 12043/24576, 8013/16352, 3983/8128,
-    16057/32767, 2509/5120, 8021/16368, 3199/6528, 3889/7936,
-    8025/16376, 5269/10752, 8027/16380, 14051/28672, 16027/32704,
-    15933/32512, 3011/6144, 16043/32736, 1333/2720, 15557/31744,
-    16051/32752, 247/504, 16057/32764, 8029/16383, 4007/8176,
-    3513/7168, 7967/16256, 16059/32767, 1337/2728, 941/1920,
-    4013/8188, 7779/15872, 223/455, 16029/32704, 15935/32512,
-    14053/28672, 16045/32736, 7999/16320, 5019/10240, 16053/32752,
-    15559/31744, 16057/32760, 2635/5376, 16059/32764, 6023/12288,
-    1145/2336, 249/508, 16061/32767, 8023/16368, 7027/14336,
-    5333/10880, 349/712, 7529/15360, 1147/2340, 1945/3968, 4015/8191,
-    16031/32704, 15937/32512, 12047/24576, 5349/10912, 25/51,
-    12049/24576, 8017/16352, 2295/4681, 3985/8128, 2675/5456,
-    16003/32640, 8029/16376, 2677/5460, 3891/7936, 7531/15360,
-    7029/14336, 16035/32704, 15941/32512, 6025/12288, 16051/32736,
-    4001/8160, 16059/32752, 16063/32760, 16065/32764, 8033/16383,
-    659/1344, 15565/31744, 5021/10240, 4009/8176, 14059/28672,
-    16067/32767, 7971/16256, 4013/8184, 1067/2176, 4015/8188,
-    7783/15872, 1883/3840, 2291/4672, 15943/32512, 3515/7168,
-    5351/10912, 8003/16320, 16061/32752, 51/104, 16067/32764,
-    7909/16128, 15567/31744, 3013/6144, 8019/16352, 16069/32767,
-    1993/4064, 8027/16368, 14061/28672, 16007/32640, 8031/16376,
-    8033/16380, 4017/8191, 5273/10752, 973/1984, 16039/32704,
-    2511/5120, 15945/32512, 12053/24576, 16055/32736, 667/1360,
-    16063/32752, 7031/14336, 16067/32760, 16069/32764, 8035/16383,
-    565/1152, 15569/31744, 2005/4088, 15067/30720, 16071/32767,
-    7973/16256, 669/1364, 16009/32640, 7785/15872, 16041/32704,
-    3767/7680, 15947/32512, 16057/32736, 1601/3264, 16065/32752,
-    16069/32760, 16071/32764, 879/1792, 15571/31744, 12055/24576,
-    8021/16352, 16073/32767, 3987/8128, 5023/10240, 259/528,
-    5337/10880, 8033/16376, 1607/3276, 15823/32256, 14065/28672,
-    3893/7936, 16043/32704, 15949/32512, 1507/3072, 5353/10912,
-    4003/8160, 16067/32752, 5357/10920, 16073/32764, 2679/5461,
-    989/2016, 15573/31744, 573/1168, 7033/14336, 16075/32767,
-    7975/16256, 365/744, 15071/30720, 16013/32640, 4017/8188, 287/585,
-    5275/10752, 7787/15872, 16045/32704, 14067/28672, 15951/32512,
-    16061/32736, 157/320, 16069/32752, 16073/32760, 16075/32764,
-    7913/16128, 6029/12288, 8023/16352, 15575/31744, 16077/32767,
-    997/2032, 2677/5456, 3517/7168, 3203/6528, 8035/16376,
-    15073/30720, 893/1820, 4019/8191, 2261/4608, 16047/32704,
-    1947/3968, 15953/32512, 12059/24576, 16063/32736, 1001/2040,
-    16071/32752, 14069/28672, 3215/6552, 7537/15360, 16077/32764,
-    8039/16383, 1319/2688, 1003/2044, 15577/31744, 2297/4681,
-    7977/16256, 16049/32704, 7789/15872, 15955/32512, 5355/10912,
-    8009/16320, 16073/32752, 5359/10920, 16079/32764, 3769/7680,
-    14071/28672, 7915/16128, 12061/24576, 8025/16352, 16081/32767,
-    15579/31744, 3989/8128, 8033/16368, 16019/32640, 8037/16376,
-    8039/16380, 15077/30720, 1759/3584, 2293/4672, 3895/7936,
-    15957/32512, 6031/12288, 16067/32736, 267/544, 16075/32752,
-    2297/4680, 16081/32764, 187/381, 2513/5120, 1979/4032, 4013/8176,
-    14073/28672, 16083/32767, 15581/31744, 7979/16256, 1339/2728,
-    16021/32640, 4019/8188, 15079/30720, 15833/32256, 16053/32704,
-    7037/14336, 7791/15872, 15959/32512, 16069/32736, 8011/16320,
-    699/1424, 1237/2520, 16083/32764, 377/768, 8027/16352,
-    16085/32767, 1995/4064, 15583/31744, 8035/16368, 14075/28672,
-    5341/10880, 8039/16376, 8041/16380, 4021/8191, 15835/32256,
-    5027/10240, 16055/32704, 12065/24576, 15961/32512, 487/992,
-    2003/4080, 16079/32752, 3519/7168, 1787/3640, 16085/32764,
-    2681/5461, 3959/8064, 2007/4088, 7541/15360, 16087/32767,
-    7981/16256, 2009/4092, 15585/31744, 3205/6528, 1005/2047,
-    5279/10752, 16057/32704, 15083/30720, 15963/32512, 16073/32736,
-    7793/15872, 2671/5440, 16081/32752, 3217/6552, 16087/32764,
-    7039/14336, 12067/24576, 7919/16128, 1147/2336, 519/1057,
-    1257/2560, 3991/8128, 2679/5456, 15587/31744, 16027/32640,
-    8041/16376, 383/780, 14079/28672, 15839/32256, 16059/32704,
-    3017/6144, 15965/32512, 16075/32736, 3897/7936, 4007/8160,
-    16083/32752, 16087/32760, 16089/32764, 8045/16383, 55/112,
-    16091/32767, 4019/8184, 7983/16256, 7543/15360, 4021/8188,
-    5343/10880, 15589/31744, 2011/4095, 16061/32704, 2263/4608,
-    14081/28672, 5359/10912, 15967/32512, 5029/10240, 16085/32752,
-    1603/3264, 7795/15872, 5363/10920, 16091/32764, 6035/12288,
-    8031/16352, 7921/16128, 2299/4681, 7041/14336, 8039/16368,
-    499/1016, 8043/16376, 943/1920, 1609/3276, 15591/31744, 4023/8191,
-    16063/32704, 5281/10752, 12071/24576, 16079/32736, 15969/32512,
-    14083/28672, 16087/32752, 167/340, 16091/32760, 15089/30720,
-    16093/32764, 1949/3968, 8047/16383, 251/511, 16081/32736,
-    15971/32512, 16089/32752, 8017/16320, 2299/4680, 16095/32764,
-    7797/15872, 15091/30720, 14085/28672, 12073/24576, 8033/16352,
-    16097/32767, 2641/5376, 731/1488, 3993/8128, 8045/16376,
-    1069/2176, 619/1260, 15595/31744, 3773/7680, 7043/14336,
-    16067/32704, 15847/32256, 6037/12288, 5361/10912, 15973/32512,
-    16091/32752, 4009/8160, 1073/2184, 16097/32764, 2683/5461,
-    3899/7936, 5031/10240, 14087/28672, 4017/8176, 16099/32767,
-    283/576, 4021/8184, 7987/16256, 4023/8188, 16037/32640,
-    15597/31744, 7547/15360, 16069/32704, 1761/3584, 16085/32736,
-    15975/32512, 16093/32752, 2673/5440, 16097/32760, 16099/32764,
-    7799/15872, 3019/6144, 8035/16352, 16101/32767, 7925/16128,
-    14089/28672, 2681/5456, 1997/4064, 8047/16376, 16039/32640,
-    2683/5460, 4025/8191, 15599/31744, 629/1280, 16071/32704,
-    15851/32256, 12077/24576, 16087/32736, 15977/32512, 7045/14336,
-    16095/32752, 401/816, 16099/32760, 16101/32764, 8051/16383,
-    975/1984, 287/584, 15097/30720, 16103/32767, 1321/2688, 2011/4092,
-    7989/16256, 15601/31744, 16073/32704, 7549/15360, 15853/32256,
-    173/352, 15979/32512, 16097/32752, 8021/16320, 1789/3640,
-    16103/32764, 3523/7168, 7801/15872, 12079/24576, 8037/16352,
-    16105/32767, 5033/10240, 7927/16128, 8045/16368, 3995/8128,
-    8049/16376, 16043/32640, 8051/16380, 14093/28672, 15603/31744,
-    16075/32704, 755/1536, 16091/32736, 15981/32512, 16099/32752,
-    1337/2720, 16103/32760, 16105/32764, 8053/16383, 3901/7936,
-    7047/14336, 4019/8176, 2301/4681, 991/2016, 1341/2728,
-    15101/30720, 7991/16256, 175/356, 3209/6528, 671/1365,
-    15605/31744, 16077/32704, 14095/28672, 15857/32256, 1463/2976,
-    2517/5120, 15983/32512, 16101/32752, 8023/16320, 3221/6552,
-    16107/32764, 6041/12288, 7803/15872, 8039/16352, 16109/32767,
-    881/1792, 8047/16368, 999/2032, 8051/16376, 15103/30720,
-    5349/10880, 8053/16380, 4027/8191, 15607/31744, 2297/4672,
-    12083/24576, 15859/32256, 5365/10912, 14097/28672, 15985/32512,
-    16103/32752, 59/120, 16109/32764, 2685/5461, 1005/2044, 1951/3968,
-    16111/32767, 503/1023, 16081/32704, 15609/31744, 16097/32736,
-    5287/10752, 16105/32752, 15987/32512, 16109/32760, 535/1088,
-    16111/32764, 7553/15360, 14099/28672, 12085/24576, 8041/16352,
-    16113/32767, 7805/15872, 2683/5456, 1133/2304, 8053/16376,
-    3997/8128, 179/364, 16051/32640, 15107/30720, 3525/7168,
-    16083/32704, 15611/31744, 6043/12288, 16099/32736, 15863/32256,
-    16107/32752, 15989/32512, 16111/32760, 4013/8160, 16113/32764,
-    8057/16383, 1259/2560, 14101/28672, 4021/8176, 16115/32767,
-    3903/7936, 4025/8184, 661/1344, 4027/8188, 7995/16256,
-    15109/30720, 16085/32704, 7051/14336, 15613/31744, 5367/10912,
-    15865/32256, 181/368, 15991/32512, 5371/10920, 8027/16320,
-    16115/32764, 1511/3072, 1149/2336, 16117/32767, 7807/15872,
-    14103/28672, 8051/16368, 7933/16128, 8055/16376, 1999/4064,
-    1151/2340, 3211/6528, 4029/8191, 5037/10240, 16087/32704,
-    12089/24576, 15615/31744, 16103/32736, 1763/3584, 16111/32752,
-    15993/32512, 3223/6552, 669/1360, 16117/32764, 8059/16383,
-    1889/3840, 2011/4088, 16119/32767, 61/124, 1007/2047, 16089/32704,
-    15113/30720, 16105/32736, 15617/31744, 16113/32752, 2267/4608,
-    16117/32760, 15995/32512, 16119/32764, 8029/16320, 7053/14336,
-    12091/24576, 8045/16352, 2303/4681, 2519/5120, 8053/16368,
-    7809/15872, 8057/16376, 2645/5376, 8059/16380, 3999/8128,
-    14107/28672, 16091/32704, 3023/6144, 5369/10912, 15619/31744,
-    16115/32752, 15871/32256, 1791/3640, 15997/32512, 16121/32764,
-    803/1632, 2687/5461, 3527/7168, 4023/8176, 16123/32767, 3779/7680,
-    4027/8184, 3905/7936, 4029/8188, 31/63, 1985/4032, 3907/7936,
-    3781/7680, 16101/32704, 3529/7168, 16117/32736, 16125/32752,
-    16129/32760, 16131/32764, 1607/3264, 16007/32512, 15881/32256,
-    15629/31744, 3025/6144, 16133/32767, 8051/16352, 14117/28672,
-    8059/16368, 8063/16376, 1613/3276, 4033/8191, 2001/4064,
-    2647/5376, 7815/15872, 2521/5120, 16103/32704, 12101/24576,
-    5373/10912, 7059/14336, 16127/32752, 5377/10920, 16133/32764,
-    2689/5461, 2009/4080, 16009/32512, 2269/4608, 15631/31744,
-    15127/30720, 2305/4681, 2013/4088, 65/132, 3971/8064, 977/1984,
-    16105/32704, 1891/3840, 16121/32736, 16129/32752, 1241/2520,
-    16135/32764, 2679/5440, 16011/32512, 1765/3584, 15633/31744,
-    12103/24576, 16137/32767, 8053/16352, 5043/10240, 2687/5456,
-    8065/16376, 2689/5460, 3215/6528, 4003/8128, 7943/16128,
-    14121/28672, 7817/15872, 2301/4672, 1513/3072, 16123/32736,
-    16131/32752, 461/936, 16137/32764, 8069/16383, 4019/8160,
-    16013/32512, 15887/32256, 15635/31744, 7061/14336, 16139/32767,
-    4027/8176, 15131/30720, 4031/8184, 4033/8188, 2017/4095,
-    8007/16256, 331/672, 3909/7936, 16109/32704, 14123/28672,
-    5375/10912, 1261/2560, 16133/32752, 1793/3640, 16139/32764,
-    8039/16320, 16015/32512, 15889/32256, 6053/12288, 15637/31744,
-    16141/32767, 8055/16352, 3531/7168, 733/1488, 15133/30720,
-    8067/16376, 8069/16380, 4035/8191, 16079/32640, 1001/2032,
-    1135/2304, 7819/15872, 16111/32704, 12107/24576, 16127/32736,
-    14125/28672, 16135/32752, 7567/15360, 16139/32760, 16141/32764,
-    8071/16383, 67/136, 16017/32512, 5297/10752, 15639/31744,
-    16143/32767, 1007/2044, 3973/8064, 1955/3968, 16113/32704,
-    16129/32736, 16137/32752, 16141/32760, 16143/32764, 473/960,
-    16019/32512, 14127/28672, 15893/32256, 12109/24576, 16145/32767,
-    1151/2336, 15641/31744, 8065/16368, 8069/16376, 1153/2340,
-    5361/10880, 15137/30720, 4005/8128, 883/1792, 16115/32704,
-    7821/15872, 6055/12288, 5377/10912, 16139/32752, 5381/10920,
-    16145/32764, 2691/5461, 4021/8160, 16021/32512, 2523/5120,
-    15895/32256, 14129/28672, 16147/32767, 4029/8176, 15643/31744,
-    4033/8184, 4035/8188, 3217/6528, 8011/16256, 15139/30720,
-    1987/4032, 16117/32704, 7065/14336, 3911/7936, 16133/32736,
-    16141/32752, 3229/6552, 16147/32764, 2681/5440, 16023/32512,
-    757/1536, 2307/4681, 8059/16352, 15645/31744, 14131/28672,
-    2689/5456, 8071/16376, 69/140, 4037/8191, 16087/32640, 2003/4064,
-    7949/16128, 5047/10240, 16119/32704, 12113/24576, 7823/15872,
-    16135/32736, 3533/7168, 16143/32752, 16147/32760, 16149/32764,
-    8075/16383, 2011/4080, 16025/32512, 15899/32256, 7571/15360,
-    521/1057, 2015/4088, 15647/31744, 2017/4092, 1009/2047,
-    8013/16256, 1325/2688, 15143/30720, 2303/4672, 489/992,
-    16145/32752, 769/1560, 16151/32764, 1609/3264, 7067/14336,
-    16027/32512, 12115/24576, 15901/32256, 16153/32767, 8061/16352,
-    631/1280, 8069/16368, 15649/31744, 351/712, 1615/3276,
-    16091/32640, 4007/8128, 14135/28672, 7951/16128, 16123/32704,
-    3029/6144, 16139/32736, 7825/15872, 16147/32752, 16151/32760,
-    16153/32764, 8077/16383, 1341/2720, 16029/32512, 1767/3584,
-    16155/32767, 4031/8176, 7573/15360, 1345/2728, 15651/31744,
-    4037/8188, 673/1365, 16093/32640, 8015/16256, 71/144, 16125/32704,
-    14137/28672, 16141/32736, 5049/10240, 16149/32752, 3913/7936,
-    16153/32760, 16155/32764, 8047/16320, 16031/32512, 6059/12288,
-    15905/32256, 107/217, 8063/16352, 7069/14336, 8071/16368,
-    3787/7680, 8075/16376, 15653/31744, 8077/16380, 4039/8191,
-    1073/2176, 501/1016, 2651/5376, 16127/32704, 12119/24576,
-    5381/10912, 14139/28672, 16151/32752, 15149/30720, 359/728,
-    7827/15872, 16157/32764, 2693/5461, 503/1020, 16033/32512,
-    15907/32256, 16159/32767, 3977/8064, 16129/32704, 16145/32736,
-    16153/32752, 16157/32760, 16159/32764, 1957/3968, 15151/30720,
-    2683/5440, 14141/28672, 16035/32512, 12121/24576, 16161/32767,
-    5303/10752, 8065/16352, 2691/5456, 8077/16376, 2693/5460,
-    15657/31744, 947/1920, 4009/8128, 7071/14336, 7955/16128,
-    16131/32704, 6061/12288, 16147/32736, 16155/32752, 1243/2520,
-    16161/32764, 8081/16383, 7829/15872, 805/1632, 5051/10240,
-    16037/32512, 14143/28672, 2309/4681, 2273/4608, 4033/8176,
-    367/744, 4039/8188, 15659/31744, 5367/10880, 7577/15360,
-    8019/16256, 221/448, 5383/10912, 16157/32752, 5387/10920,
-    16163/32764, 8051/16320, 3915/7936, 16039/32512, 3031/6144,
-    16165/32767, 8067/16352, 15913/32256, 14145/28672, 8075/16368,
-    8079/16376, 8081/16380, 4041/8191, 16103/32640, 15661/31744,
-    2005/4064, 1263/2560, 2305/4672, 7957/16128, 12125/24576,
-    521/1056, 7073/14336, 16159/32752, 2309/4680, 16165/32764,
-    8083/16383, 671/1360, 7831/15872, 16041/32512, 15157/30720,
-    16167/32767, 2017/4088, 5305/10752, 673/1364, 3221/6528,
-    15663/31744, 8021/16256, 7579/15360, 16137/32704, 3979/8064,
-    16153/32736, 16161/32752, 3233/6552, 16167/32764, 3537/7168,
-    8053/16320, 979/1984, 16043/32512, 12127/24576, 16169/32767,
-    8069/16352, 5053/10240, 15917/32256, 8077/16368, 8081/16376,
-    8083/16380, 5369/10880, 14149/28672, 15665/31744, 4011/8128,
-    16139/32704, 379/768, 5385/10912, 16163/32752, 5389/10920,
-    16169/32764, 2695/5461, 4027/8160, 16045/32512, 7833/15872,
-    7075/14336, 16171/32767, 4035/8176, 15919/32256, 15161/30720,
-    4039/8184, 4041/8188, 2021/4095, 16109/32640, 8023/16256,
-    15667/31744, 14151/28672, 16141/32704, 995/2016, 16157/32736,
-    2527/5120, 16165/32752, 16169/32760, 16171/32764, 537/1088,
-    6065/12288, 16047/32512, 3917/7936, 16173/32767, 1153/2336,
-    1769/3584, 2693/5456, 15163/30720, 8083/16376, 77/156, 4043/8191,
-    16111/32640, 1003/2032, 15669/31744, 16143/32704, 12131/24576,
-    7961/16128, 1469/2976, 14153/28672, 16167/32752, 3791/7680,
-    16171/32760, 16173/32764, 8087/16383, 1007/2040, 16049/32512,
-    7835/15872, 16175/32767, 1009/2044, 15923/32256, 505/1023,
-    8025/16256, 15671/31744, 16145/32704, 1327/2688, 5387/10912,
-    703/1424, 1797/3640, 16175/32764, 7583/15360, 14155/28672,
-    8057/16320, 12133/24576, 16051/32512, 2311/4681, 1959/3968,
-    8073/16352, 2275/4608, 8081/16368, 8085/16376, 8087/16380,
-    15167/30720, 3223/6528, 3539/7168, 4013/8128, 15673/31744,
-    16147/32704, 6067/12288, 7963/16128, 16163/32736, 16171/32752,
-    3235/6552, 16177/32764, 8089/16383, 79/160, 16053/32512,
-    14157/28672, 16179/32767, 4037/8176, 7837/15872, 1347/2728,
-    5309/10752, 4043/8188, 16117/32640, 15169/30720, 8027/16256,
-    7079/14336, 2307/4672, 15675/31744, 16165/32736, 1991/4032,
-    16173/32752, 2311/4680, 16179/32764, 8059/16320, 1517/3072,
-    16055/32512, 16181/32767, 8075/16352, 3919/7936, 14159/28672,
-    8083/16368, 15929/32256, 8087/16376, 8089/16380, 4045/8191,
-    5373/10880, 5057/10240, 2007/4064, 16151/32704, 12137/24576,
-    15677/31744, 5389/10912, 885/1792, 16175/32752, 5393/10920,
-    16181/32764, 2697/5461, 403/816, 16057/32512, 3793/7680,
-    16183/32767, 2019/4088, 7839/15872, 2021/4092, 15931/32256,
-    1011/2047, 16121/32640, 8029/16256, 15173/30720, 16153/32704,
-    15679/31744, 16169/32736, 569/1152, 16177/32752, 16181/32760,
-    16183/32764, 7081/14336, 2687/5440, 12139/24576, 16059/32512,
-    16185/32767, 2529/5120, 8077/16352, 245/496, 8089/16376,
-    5311/10752, 899/1820, 16123/32640, 14163/28672, 4015/8128,
-    16155/32704, 3035/6144, 16171/32736, 15681/31744, 16179/32752,
-    7967/16128, 16183/32760, 16185/32764, 8093/16383, 4031/8160,
-    3541/7168, 16061/32512, 16187/32767, 577/1168, 1897/3840,
-    4043/8184, 7841/15872, 4045/8188, 15935/32256, 289/585, 1075/2176,
-    8031/16256, 14165/28672, 16157/32704, 5059/10240, 5391/10912,
-    15683/31744, 16181/32752, 83/168, 16187/32764, 8063/16320,
-    6071/12288, 16063/32512, 16189/32767, 8079/16352, 7083/14336,
-    8087/16368, 7589/15360, 8091/16376, 3921/7936, 8093/16380,
-    15937/32256, 4047/8191, 16127/32640, 251/508, 16159/32704,
-    12143/24576, 16175/32736, 14167/28672, 16183/32752, 15179/30720,
-    16187/32760, 15685/31744, 16189/32764, 7969/16128, 8095/16383,
-    16177/32736, 16185/32752, 16189/32760, 16191/32764, 3985/8064,
-    15687/31744, 15181/30720, 14169/28672, 1613/3264, 12145/24576,
-    16193/32767, 16067/32512, 8081/16352, 8089/16368, 8093/16376,
-    1619/3276, 15941/32256, 1961/3968, 7591/15360, 5377/10880,
-    7085/14336, 4017/8128, 2309/4672, 6073/12288, 5393/10912,
-    16187/32752, 257/520, 16193/32764, 2699/5461, 2657/5376,
-    15689/31744, 5061/10240, 4033/8160, 14171/28672, 16195/32767,
-    16069/32512, 4041/8176, 4045/8184, 4047/8188, 15943/32256,
-    7845/15872, 949/1920, 8035/16256, 3543/7168, 16165/32704,
-    1471/2976, 16189/32752, 16193/32760, 16195/32764, 1993/4032,
-    15691/31744, 2689/5440, 3037/6144, 16197/32767, 16071/32512,
-    8083/16352, 14173/28672, 87/176, 8095/16376, 2699/5460, 4049/8191,
-    5315/10752, 3923/7936, 3227/6528, 2531/5120, 2009/4064,
-    16167/32704, 12149/24576, 16183/32736, 7087/14336, 16191/32752,
-    3239/6552, 16197/32764, 8099/16383, 1139/2304, 15693/31744,
-    2017/4080, 15187/30720, 16199/32767, 16073/32512, 2021/4088,
-    2023/4092, 15947/32256, 7847/15872, 5379/10880, 3797/7680,
-    8037/16256, 16169/32704, 5395/10912, 16193/32752, 5399/10920,
-    16199/32764, 443/896, 8069/16320, 15695/31744, 12151/24576,
-    16201/32767, 16075/32512, 5063/10240, 1155/2336, 8093/16368,
-    8097/16376, 89/180, 15949/32256, 14177/28672, 16139/32640,
-    981/1984, 4019/8128, 16171/32704, 1519/3072, 16187/32736,
-    16195/32752, 16199/32760, 16201/32764, 8101/16383, 7975/16128,
-    269/544, 15697/31744, 7089/14336, 16203/32767, 16077/32512,
-    4043/8176, 15191/30720, 1349/2728, 4049/8188, 45/91, 5317/10752,
-    16141/32640, 7849/15872, 14179/28672, 8039/16256, 16173/32704,
-    633/1280, 16189/32736, 16197/32752, 16201/32760, 16203/32764,
-    997/2016, 8071/16320, 6077/12288, 15699/31744, 2315/4681,
-    16079/32512, 8087/16352, 3545/7168, 8095/16368, 15193/30720,
-    91/184, 8101/16380, 4051/8191, 2279/4608, 5381/10880, 3925/7936,
-    1005/2032, 16175/32704, 12155/24576, 5397/10912, 14181/28672,
-    16199/32752, 7597/15360, 5401/10920, 16205/32764, 2701/5461,
-    2659/5376, 1009/2040, 15701/31744, 16207/32767, 16081/32512,
-    1011/2044, 15955/32256, 3229/6528, 7851/15872, 8041/16256,
-    2311/4672, 16193/32736, 16201/32752, 463/936, 16207/32764,
-    3799/7680, 14183/28672, 3989/8064, 2691/5440, 12157/24576,
-    16209/32767, 15703/31744, 16083/32512, 8089/16352, 2699/5456,
-    8101/16376, 2701/5460, 15197/30720, 1773/3584, 16147/32640,
-    1963/3968, 4021/8128, 16179/32704, 6079/12288, 16195/32736,
-    16203/32752, 16207/32760, 16209/32764, 8105/16383, 2533/5120,
-    7979/16128, 4037/8160, 14185/28672, 16211/32767, 15705/31744,
-    16085/32512, 4045/8176, 4049/8184, 4051/8188, 15199/30720,
-    15959/32256, 5383/10880, 7093/14336, 7853/15872, 8043/16256,
-    16181/32704, 5399/10912, 16205/32752, 1801/3640, 16211/32764,
-    95/192, 523/1057, 8091/16352, 16087/32512, 15707/31744,
-    14187/28672, 8099/16368, 8103/16376, 1621/3276, 4053/8191,
-    16151/32640, 15961/32256, 5067/10240, 12161/24576, 16183/32704,
-    2011/4064, 3927/7936, 16199/32736, 3547/7168, 16207/32752,
-    1247/2520, 16213/32764, 8107/16383, 673/1360, 7981/16128,
-    7601/15360, 16215/32767, 289/584, 16089/32512, 15709/31744,
-    675/1364, 1013/2047, 16153/32640, 5321/10752, 15203/30720,
-    16185/32704, 8045/16256, 7855/15872, 16201/32736, 16209/32752,
-    16213/32760, 16215/32764, 7095/14336, 12163/24576, 8077/16320,
-    3991/8064, 16217/32767, 1267/2560, 8093/16352, 16091/32512,
-    15711/31744, 8101/16368, 8105/16376, 8107/16380, 14191/28672,
-    1077/2176, 15965/32256, 3041/6144, 16187/32704, 4023/8128,
-    491/992, 16211/32752, 1081/2184, 16217/32764, 2703/5461,
-    4039/8160, 887/1792, 2317/4681, 4047/8176, 16093/32512,
-    7603/15360, 4051/8184, 15713/31744, 4053/8188, 2027/4095,
-    16157/32640, 2281/4608, 14193/28672, 16189/32704, 8047/16256,
-    5069/10240, 16205/32736, 7857/15872, 16213/32752, 16217/32760,
-    16219/32764, 6083/12288, 2693/5440, 499/1008, 16221/32767,
-    8095/16352, 7097/14336, 16095/32512, 2701/5456, 1901/3840,
-    8107/16376, 15715/31744, 901/1820, 4055/8191, 16159/32640,
-    5323/10752, 12167/24576, 2313/4672, 503/1016, 16207/32736,
-    14195/28672, 705/1424, 15209/30720, 2317/4680, 3929/7936,
-    16221/32764, 8111/16383, 101/204, 7985/16128, 16223/32767,
-    253/511, 5387/10880, 15971/32256, 16193/32704, 8049/16256,
-    5403/10912, 16217/32752, 5407/10920, 16223/32764, 7859/15872,
-    15211/30720, 14197/28672, 12169/24576, 8081/16320, 16225/32767,
-    1331/2688, 8097/16352, 16099/32512, 8105/16368, 8109/16376,
-    8111/16380, 15719/31744, 3803/7680, 7099/14336, 16163/32640,
-    15973/32256, 6085/12288, 16195/32704, 4025/8128, 16211/32736,
-    16219/32752, 16223/32760, 16225/32764, 8113/16383, 1965/3968,
-    5071/10240, 1347/2720, 14199/28672, 16227/32767, 1141/2304,
-    4049/8176, 16101/32512, 1351/2728, 4055/8188, 15721/31744,
-    7607/15360, 3233/6528, 1775/3584, 16197/32704, 8051/16256,
-    523/1056, 16221/32752, 3245/6552, 16227/32764, 7861/15872,
-    3043/6144, 8083/16320, 16229/32767, 1997/4032, 1157/2336,
-    14201/28672, 16103/32512, 737/1488, 8111/16376, 1159/2340,
-    4057/8191, 15723/31744, 317/640, 15977/32256, 12173/24576,
-    16199/32704, 2013/4064, 5405/10912, 7101/14336, 16223/32752,
-    1803/3640, 16229/32764, 2705/5461, 3931/7936, 2021/4080,
-    15217/30720, 16231/32767, 2663/5376, 2025/4088, 16105/32512,
-    2027/4092, 15725/31744, 16169/32640, 7609/15360, 15979/32256,
-    16201/32704, 8053/16256, 16217/32736, 16225/32752, 16229/32760,
-    16231/32764, 3551/7168, 7863/15872, 12175/24576, 539/1088,
-    2319/4681, 5073/10240, 3995/8064, 8101/16352, 16107/32512,
-    2703/5456, 8113/16376, 541/1092, 14205/28672, 15727/31744,
-    16171/32640, 761/1536, 16203/32704, 4027/8128, 16219/32736,
-    16227/32752, 16231/32760, 16233/32764, 8117/16383, 983/1984,
-    4043/8160, 7103/14336, 16235/32767, 7991/16128, 4051/8176,
-    15221/30720, 16109/32512, 4055/8184, 4057/8188, 2029/4095,
-    15729/31744, 5391/10880, 14207/28672, 15983/32256, 2315/4672,
-    2537/5120, 8055/16256, 5407/10912, 16229/32752, 773/1560,
-    16235/32764, 6089/12288, 7865/15872, 8087/16320, 16237/32767,
-    111/224, 8111/16368, 16111/32512, 15223/30720, 8115/16376,
-    8117/16380, 4059/8191, 3235/6528, 15731/31744, 12179/24576,
-    16207/32704, 15985/32256, 14209/28672, 16223/32736, 1007/2032,
-    16231/32752, 1903/3840, 3247/6552, 16237/32764, 8119/16383,
-    337/680, 3933/7936, 16239/32767, 1013/2044, 7993/16128, 169/341,
-    16177/32640, 15733/31744, 16209/32704, 5329/10752, 1475/2976,
-    8057/16256, 16233/32752, 1249/2520, 16239/32764, 7613/15360,
-    14211/28672, 12181/24576, 8089/16320, 16241/32767, 7867/15872,
-    8105/16352, 571/1152, 8113/16368, 16115/32512, 8117/16376,
-    8119/16380, 15227/30720, 3553/7168, 5393/10880, 15735/31744,
-    6091/12288, 16211/32704, 15989/32256, 5409/10912, 4029/8128,
-    16235/32752, 5413/10920, 16241/32764, 2707/5461, 1269/2560,
-    14213/28672, 809/1632, 16243/32767, 1967/3968, 579/1168,
-    2665/5376, 4057/8184, 16117/32512, 4059/8188, 15229/30720,
-    16181/32640, 7107/14336, 15737/31744, 16213/32704, 15991/32256,
-    16229/32736, 8059/16256, 16237/32752, 16241/32760, 16243/32764,
-    1523/3072, 2697/5440, 16245/32767, 7869/15872, 14215/28672,
-    8107/16352, 1999/4032, 2705/5456, 16119/32512, 353/712, 2707/5460,
-    4061/8191, 5077/10240, 16183/32640, 12185/24576, 15739/31744,
-    16215/32704, 1777/3584, 16231/32736, 2015/4064, 16239/32752,
-    16243/32760, 16245/32764, 8123/16383, 119/240, 2321/4681,
-    2027/4088, 3935/7936, 2029/4092, 7997/16128, 1015/2047, 1079/2176,
-    15233/30720, 16217/32704, 15741/31744, 5411/10912, 2285/4608,
-    16241/32752, 8061/16256, 361/728, 16247/32764, 7109/14336,
-    12187/24576, 8093/16320, 16249/32767, 2539/5120, 8109/16352,
-    7871/15872, 8117/16368, 1333/2688, 8121/16376, 16123/32512,
-    8123/16380, 14219/28672, 16187/32640, 3047/6144, 2317/4672,
-    15743/31744, 16235/32736, 15997/32256, 16243/32752, 4031/8128,
-    2321/4680, 16249/32764, 8125/16383, 3555/7168, 1349/2720,
-    16251/32767, 3809/7680, 4055/8176, 123/248, 4061/8188, 7999/16128,
-    677/1365, 16189/32640, 14221/28672, 16221/32704, 5079/10240,
-    16237/32736, 15745/31744, 16245/32752, 5333/10752, 16249/32760,
-    8063/16256, 16251/32764, 6095/12288, 1619/3264, 16253/32767,
-    7111/14336, 8111/16352, 7619/15360, 8119/16368, 7873/15872,
-    8123/16376, 125/252, 4063/8191, 5397/10880, 12191/24576,
-    16223/32704, 14223/28672, 5413/10912, 15239/30720, 16247/32752,
-    15747/31744, 5417/10920, 16001/32256, 16253/32764, 63/127,
-    8065/16256, 16003/32256, 15749/31744, 15241/30720, 14225/28672,
-    12193/24576, 16257/32767, 2699/5440, 1159/2336, 2707/5456,
-    8125/16376, 129/260, 16131/32512, 4001/8064, 7875/15872,
-    7621/15360, 7113/14336, 3239/6528, 6097/12288, 16227/32704,
-    16243/32736, 16251/32752, 3251/6552, 16257/32764, 8129/16383,
-    4033/8128, 5335/10752, 15751/31744, 5081/10240, 14227/28672,
-    16259/32767, 4049/8160, 4057/8176, 131/264, 4063/8188,
-    16133/32512, 8003/16128, 1969/3968, 3811/7680, 5399/10880,
-    3557/7168, 16229/32704, 5415/10912, 16253/32752, 5419/10920,
-    16259/32764, 8067/16256, 16007/32256, 15753/31744, 3049/6144,
-    2323/4681, 8099/16320, 14229/28672, 8115/16352, 8123/16368,
-    8127/16376, 8129/16380, 4065/8191, 16135/32512, 667/1344,
-    7877/15872, 2541/5120, 16199/32640, 12197/24576, 16231/32704,
-    7115/14336, 1477/2976, 16255/32752, 16259/32760, 16261/32764,
-    8131/16383, 2017/4064, 2287/4608, 15755/31744, 15247/30720,
-    16263/32767, 135/272, 2029/4088, 677/1364, 16137/32512,
-    8005/16128, 3939/7936, 953/1920, 2319/4672, 16249/32736,
-    16257/32752, 2323/4680, 16263/32764, 8069/16256, 1779/3584,
-    15757/31744, 12199/24576, 16265/32767, 8101/16320, 5083/10240,
-    8117/16352, 8125/16368, 8129/16376, 8131/16380, 16139/32512,
-    4003/8064, 14233/28672, 7879/15872, 5401/10880, 1525/3072,
-    16235/32704, 5417/10912, 16259/32752, 139/280, 16265/32764,
-    2711/5461, 4035/8128, 16013/32256, 15759/31744, 7117/14336,
-    16267/32767, 4051/8160, 15251/30720, 4059/8176, 4063/8184,
-    4065/8188, 2033/4095, 16141/32512, 2669/5376, 985/1984, 3241/6528,
-    14235/28672, 16237/32704, 1271/2560, 16253/32736, 707/1424,
-    3253/6552, 16267/32764, 8071/16256, 16015/32256, 6101/12288,
-    15761/31744, 16269/32767, 2701/5440, 3559/7168, 8119/16352,
-    15253/30720, 2709/5456, 8131/16376, 2711/5460, 4067/8191,
-    16143/32512, 143/288, 7881/15872, 16207/32640, 12203/24576,
-    16239/32704, 14237/28672, 16255/32736, 7627/15360, 16263/32752,
-    16267/32760, 16269/32764, 8135/16383, 1009/2032, 5339/10752,
-    15763/31744, 16271/32767, 1013/2040, 145/292, 16145/32512,
-    8009/16128, 3941/7936, 5403/10880, 16241/32704, 5419/10912,
-    16265/32752, 5423/10920, 16271/32764, 1907/3840, 8073/16256,
-    14239/28672, 16019/32256, 12205/24576, 16273/32767, 15765/31744,
-    1621/3264, 8121/16352, 739/1488, 8133/16376, 1627/3276,
-    15257/30720, 16147/32512, 445/896, 16211/32640, 7883/15872,
-    6103/12288, 16243/32704, 16259/32736, 16267/32752, 16271/32760,
-    16273/32764, 8137/16383, 4037/8128, 2543/5120, 16021/32256,
-    14241/28672, 75/151, 1351/2720, 15767/31744, 4061/8176, 1355/2728,
-    4067/8188, 16149/32512, 15259/30720, 8011/16128, 7121/14336,
-    16213/32640, 1971/3968, 16245/32704, 16261/32736, 16269/32752,
-    16273/32760, 16275/32764, 8075/16256, 763/1536, 16277/32767,
-    8107/16320, 15769/31744, 14243/28672, 8123/16352, 8131/16368,
-    8135/16376, 8137/16380, 4069/8191, 16151/32512, 2003/4032,
-    5087/10240, 1081/2176, 12209/24576, 7885/15872, 2321/4672,
-    3561/7168, 5421/10912, 16271/32752, 155/312, 16277/32764,
-    2713/5461, 2019/4064, 16025/32256, 7631/15360, 16279/32767,
-    2027/4080, 15771/31744, 2031/4088, 2033/4092, 1017/2047,
-    16153/32512, 2671/5376, 15263/30720, 16217/32640, 3943/7936,
-    16249/32704, 16265/32736, 16273/32752, 16277/32760, 16279/32764,
-    7123/14336, 8077/16256, 12211/24576, 16027/32256, 16281/32767,
-    159/320, 8125/16352, 15773/31744, 2711/5456, 8137/16376,
-    2713/5460, 16155/32512, 14247/28672, 4007/8064, 16219/32640,
-    3053/6144, 16251/32704, 7887/15872, 16267/32736, 16275/32752,
-    16279/32760, 16281/32764, 8141/16383, 4039/8128, 1781/3584,
-    16283/32767, 811/1632, 7633/15360, 4063/8176, 15775/31744,
-    4067/8184, 4069/8188, 407/819, 16157/32512, 1145/2304,
-    14249/28672, 5407/10880, 5089/10240, 16253/32704, 493/992,
-    16277/32752, 1809/3640, 16283/32764, 8079/16256, 6107/12288,
-    16031/32256, 16285/32767, 8111/16320, 7125/14336, 1161/2336,
-    3817/7680, 8135/16368, 15777/31744, 8139/16376, 1163/2340,
-    4071/8191, 16159/32512, 167/336, 16223/32640, 12215/24576,
-    16255/32704, 14251/28672, 16271/32736, 15269/30720, 16279/32752,
-    7889/15872, 16283/32760, 16285/32764, 8143/16383, 505/1016,
-    16033/32256, 16287/32767, 169/340, 16161/32512, 8017/16128,
-    3245/6528, 16257/32704, 16273/32736, 16281/32752, 3257/6552,
-    16287/32764, 3945/7936, 15271/30720, 14253/28672, 8081/16256,
-    12217/24576, 2327/4681, 5345/10752, 8113/16320, 8129/16352,
-    8137/16368, 8141/16376, 8143/16380, 15781/31744, 1909/3840,
-    16163/32512, 7127/14336, 4009/8064, 5409/10880, 6109/12288,
-    16259/32704, 175/352, 16283/32752, 5429/10920, 16289/32764,
-    2715/5461, 7891/15872, 5091/10240, 4041/8128, 14255/28672,
-    16291/32767, 2291/4608, 4057/8160, 4065/8176, 4069/8184, 177/356,
-    15783/31744, 7637/15360, 16165/32512, 891/1792, 16229/32640,
-    2323/4672, 16277/32736, 16285/32752, 179/360, 16291/32764,
-    1973/3968, 8083/16256, 3055/6144, 16293/32767, 16039/32256,
-    541/1088, 14257/28672, 8131/16352, 2713/5456, 8143/16376, 181/364,
-    4073/8191, 15785/31744, 16167/32512, 1273/2560, 2005/4032,
-    16231/32640, 12221/24576, 16263/32704, 7129/14336, 16279/32736,
-    183/368, 16291/32760, 16293/32764, 8147/16383, 7893/15872,
-    2021/4064, 15277/30720, 16295/32767, 5347/10752, 2029/4080,
-    2033/4088, 185/372, 15787/31744, 16169/32512, 7639/15360,
-    8021/16128, 5411/10880, 16265/32704, 5427/10912, 16289/32752,
-    5431/10920, 16295/32764, 3565/7168, 3947/7936, 8085/16256,
-    12223/24576, 16297/32767, 5093/10240, 16043/32256, 8117/16320,
-    8133/16352, 8141/16368, 8145/16376, 8147/16380, 14261/28672,
-    15789/31744, 16171/32512, 191/384, 16267/32704, 16283/32736,
-    16291/32752, 3259/6552, 16297/32764, 8149/16383, 4043/8128,
-    7895/15872, 7131/14336, 16299/32767, 1353/2720, 16045/32256,
-    15281/30720, 581/1168, 1357/2728, 4073/8188, 97/195, 16173/32512,
-    15791/31744, 14263/28672, 16237/32640, 8023/16128, 2547/5120,
-    16269/32704, 16285/32736, 16293/32752, 16297/32760, 16299/32764,
-    6113/12288, 8087/16256, 987/1984, 16301/32767, 8119/16320,
-    1783/3584, 8135/16352, 15283/30720, 8143/16368, 8147/16376,
-    8149/16380, 4075/8191, 16175/32512, 15793/31744, 12227/24576,
-    5413/10880, 1003/2016, 16271/32704, 14265/28672, 5429/10912,
-    3821/7680, 16295/32752, 1811/3640, 16301/32764, 2717/5461,
-    1011/2032, 7897/15872, 2329/4681, 203/408, 16049/32256, 1017/2044,
-    509/1023, 16177/32512, 15795/31744, 16241/32640, 2675/5376,
-    16273/32704, 16289/32736, 16297/32752, 16301/32760, 16303/32764,
-    7643/15360, 14267/28672, 12229/24576, 8089/16256, 16305/32767,
-    3949/7936, 2707/5440, 2293/4608, 8137/16352, 2715/5456,
-    8149/16376, 209/420, 15287/30720, 3567/7168, 16179/32512,
-    15797/31744, 6115/12288, 16243/32640, 4013/8064, 2325/4672,
-    1481/2976, 16299/32752, 2329/4680, 16305/32764, 8153/16383,
-    637/1280, 4045/8128, 14269/28672, 16307/32767, 7899/15872,
-    4061/8160, 5351/10752, 4069/8176, 4073/8184, 4075/8188,
-    15289/30720, 16181/32512, 7135/14336, 15799/31744, 1083/2176,
-    8027/16128, 16277/32704, 5431/10912, 16301/32752, 1087/2184,
-    16307/32764, 1529/3072, 8091/16256, 16309/32767, 1975/3968,
-    8123/16320, 14271/28672, 16055/32256, 8139/16352, 8147/16368,
-    8151/16376, 8153/16380, 4077/8191, 5097/10240, 16183/32512,
-    12233/24576, 15801/31744, 16247/32640, 223/448, 16295/32736,
-    16303/32752, 16307/32760, 16309/32764, 8155/16383, 2023/4064,
-    3823/7680, 16311/32767, 677/1360, 7901/15872, 2035/4088,
-    16057/32256, 679/1364, 1019/2047, 16185/32512, 15293/30720,
-    16249/32640, 15803/31744, 16281/32704, 1147/2304, 16297/32736,
-    16305/32752, 16309/32760, 16311/32764, 7137/14336, 12235/24576,
-    8093/16256, 16313/32767, 2549/5120, 1625/3264, 3951/7936,
-    1163/2336, 5353/10752, 8149/16368, 8153/16376, 233/468,
-    14275/28672, 16187/32512, 3059/6144, 5417/10880, 15805/31744,
-    16283/32704, 4015/8064, 5433/10912, 709/1424, 5437/10920,
-    16313/32764, 2719/5461, 3569/7168, 4047/8128, 16315/32767,
-    239/480, 4071/8176, 7903/15872, 4075/8184, 16061/32256, 4077/8188,
-    2039/4095, 16189/32512, 14277/28672, 16253/32640, 5099/10240,
-    16285/32704, 15807/31744, 16301/32736, 2677/5376, 16309/32752,
-    16313/32760, 16315/32764, 6119/12288, 8095/16256, 2331/4681,
-    7139/14336, 2709/5440, 7649/15360, 8143/16352, 247/496,
-    8155/16376, 16063/32256, 2719/5460, 4079/8191, 16191/32512,
-    12239/24576, 3251/6528, 14279/28672, 16287/32704, 15299/30720,
-    16303/32736, 15809/31744, 16311/32752, 251/504, 16317/32764,
-    8159/16383, 253/508, 16319/32767, 127/255, 16193/32512,
-    5419/10880, 2327/4672, 5435/10912, 16313/32752, 259/520,
-    16319/32764, 8033/16128, 15811/31744, 15301/30720, 14281/28672,
-    12241/24576, 16321/32767, 8097/16256, 8129/16320, 8145/16352,
-    263/528, 8157/16376, 8159/16380, 16067/32256, 3953/7936,
-    7651/15360, 7141/14336, 16195/32512, 6121/12288, 16259/32640,
-    16291/32704, 16307/32736, 16315/32752, 16319/32760, 16321/32764,
-    8161/16383, 1339/2688, 15813/31744, 5101/10240, 14283/28672,
-    16323/32767, 4049/8128, 271/544, 4073/8176, 1359/2728, 4079/8188,
-    16069/32256, 7907/15872, 1913/3840, 16197/32512, 3571/7168,
-    16261/32640, 16293/32704, 16309/32736, 16317/32752, 16321/32760,
-    16323/32764, 8035/16128, 15815/31744, 3061/6144, 16325/32767,
-    8099/16256, 14285/28672, 8131/16320, 8147/16352, 8155/16368,
-    8159/16376, 8161/16380, 4081/8191, 5357/10752, 1977/3968,
-    2551/5120, 16199/32512, 12245/24576, 5421/10880, 7143/14336,
-    16295/32704, 5437/10912, 16319/32752, 5441/10920, 16325/32764,
-    2721/5461, 287/576, 15817/31744, 15307/30720, 16327/32767,
-    2025/4064, 2033/4080, 291/584, 2039/4092, 16073/32256, 7909/15872,
-    3827/7680, 16201/32512, 3253/6528, 16297/32704, 1483/2976,
-    16321/32752, 3265/6552, 16327/32764, 893/1792, 15819/31744,
-    12247/24576, 16329/32767, 8101/16256, 5103/10240, 2711/5440,
-    8149/16352, 2719/5456, 8161/16376, 907/1820, 16075/32256,
-    14289/28672, 3955/7936, 16203/32512, 1531/3072, 16267/32640,
-    16299/32704, 16315/32736, 16323/32752, 16327/32760, 16329/32764,
-    8165/16383, 4019/8064, 15821/31744, 7145/14336, 2333/4681,
-    4051/8128, 15311/30720, 4067/8160, 4075/8176, 4079/8184,
-    4081/8188, 157/315, 5359/10752, 7911/15872, 14291/28672,
-    16205/32512, 319/640, 16301/32704, 5439/10912, 16325/32752,
-    5443/10920, 16331/32764, 8039/16128, 6125/12288, 15823/31744,
-    16333/32767, 8103/16256, 3573/7168, 1627/3264, 15313/30720,
-    8151/16352, 8159/16368, 8163/16376, 1633/3276, 4083/8191,
-    2297/4608, 989/1984, 16207/32512, 12251/24576, 16271/32640,
-    14293/28672, 2329/4672, 7657/15360, 16319/32736, 16327/32752,
-    2333/4680, 16333/32764, 8167/16383, 335/672, 15825/31744,
-    16335/32767, 1013/2032, 339/680, 1019/2044, 16081/32256,
-    7913/15872, 16209/32512, 16273/32640, 16305/32704, 16321/32736,
-    16329/32752, 16333/32760, 16335/32764, 3829/7680, 14295/28672,
-    8041/16128, 12253/24576, 527/1057, 15827/31744, 8105/16256,
-    8137/16320, 8153/16352, 8161/16368, 355/712, 8167/16380,
-    15317/30720, 1787/3584, 3957/7936, 16211/32512, 6127/12288,
-    1085/2176, 16307/32704, 5441/10912, 16331/32752, 363/728,
-    16337/32764, 2723/5461, 2553/5120, 4021/8064, 14297/28672,
-    16339/32767, 15829/31744, 4053/8128, 4069/8160, 4077/8176,
-    371/744, 4083/8188, 15319/30720, 16085/32256, 7149/14336,
-    7915/15872, 16213/32512, 16277/32640, 16309/32704, 16325/32736,
-    16333/32752, 16337/32760, 16339/32764, 383/768, 16341/32767,
-    8107/16256, 15831/31744, 14299/28672, 2713/5440, 1165/2336,
-    2721/5456, 8167/16376, 389/780, 4085/8191, 16087/32256,
-    5107/10240, 12257/24576, 16215/32512, 1979/3968, 16279/32640,
-    3575/7168, 16311/32704, 16327/32736, 16335/32752, 16339/32760,
-    16341/32764, 8171/16383, 2011/4032, 7661/15360, 16343/32767,
-    2027/4064, 15833/31744, 407/816, 2039/4088, 2041/4092, 1021/2047,
-    5363/10752, 15323/30720, 16217/32512, 7917/15872, 5427/10880,
-    16313/32704, 5443/10912, 16337/32752, 419/840, 16343/32764,
-    7151/14336, 12259/24576, 8045/16128, 2335/4681, 1277/2560,
-    8109/16256, 15835/31744, 8141/16320, 8157/16352, 8165/16368,
-    8169/16376, 8171/16380, 14303/28672, 16091/32256, 3065/6144,
-    16219/32512, 3959/7936, 16283/32640, 16315/32704, 16331/32736,
-    16339/32752, 16343/32760, 16345/32764, 8173/16383, 447/896,
-    16347/32767, 4055/8128, 7663/15360, 1357/2720, 15837/31744,
-    4079/8176, 1361/2728, 4085/8188, 227/455, 2299/4608, 14305/28672,
-    16221/32512, 5109/10240, 3257/6528, 7919/15872, 2331/4672,
-    16333/32736, 16341/32752, 467/936, 16347/32764, 6131/12288,
-    8047/16128, 16349/32767, 7153/14336, 8111/16256, 479/960,
-    8159/16352, 15839/31744, 8167/16368, 8171/16376, 8173/16380,
-    4087/8191, 5365/10752, 12263/24576, 16223/32512, 14307/28672,
-    5429/10880, 15329/30720, 16319/32704, 495/992, 16343/32752,
-    5449/10920, 16349/32764, 2725/5461, 503/1008, 16351/32767,
-    507/1016, 509/1020, 255/511, 16097/32256, 16225/32512,
-    16289/32640, 16321/32704, 527/1056, 16345/32752, 16349/32760,
-    16351/32764, 7921/15872, 15331/30720, 14309/28672, 12265/24576,
-    16353/32767, 2683/5376, 8113/16256, 543/1088, 8161/16352,
-    2723/5456, 8173/16376, 545/1092, 15843/31744, 3833/7680,
-    7155/14336, 16099/32256, 6133/12288, 16227/32512, 16291/32640,
-    16323/32704, 16339/32736, 16347/32752, 16351/32760, 16353/32764,
-    8177/16383, 3961/7936, 5111/10240, 14311/28672, 16355/32767,
-    575/1152, 4057/8128, 4073/8160, 583/1168, 4085/8184, 4087/8188,
-    15845/31744, 7667/15360, 1789/3584, 16229/32512, 5431/10880,
-    16325/32704, 5447/10912, 16349/32752, 1817/3640, 16355/32764,
-    7923/15872, 3067/6144, 16357/32767, 8051/16128, 14313/28672,
-    8115/16256, 8147/16320, 8163/16352, 8171/16368, 8175/16376,
-    629/1260, 4089/8191, 15847/31744, 639/1280, 16103/32256,
-    12269/24576, 16231/32512, 7157/14336, 3259/6528, 16327/32704,
-    16343/32736, 16351/32752, 3271/6552, 16357/32764, 8179/16383,
-    1981/3968, 15337/30720, 2337/4681, 671/1344, 2029/4064, 679/1360,
-    2041/4088, 681/1364, 15849/31744, 7669/15360, 16105/32256,
-    16233/32512, 16297/32640, 16329/32704, 16345/32736, 711/1424,
-    16357/32760, 16359/32764, 3579/7168, 7925/15872, 12271/24576,
-    16361/32767, 5113/10240, 8053/16128, 8117/16256, 8149/16320,
-    8165/16352, 743/1488, 8177/16376, 8179/16380, 14317/28672,
-    15851/31744, 767/1536, 16235/32512, 5433/10880, 2333/4672,
-    5449/10912, 16355/32752, 779/1560, 16361/32764, 2727/5461,
-    3963/7936, 7159/14336, 16363/32767, 4027/8064, 15341/30720,
-    4059/8128, 815/1632, 4083/8176, 4087/8184, 4089/8188, 409/819,
-    15853/31744, 14319/28672, 16109/32256, 2557/5120, 16237/32512,
-    16301/32640, 16333/32704, 16349/32736, 16357/32752, 16361/32760,
-    16363/32764, 6137/12288, 7927/15872, 16365/32767, 895/1792,
-    8119/16256, 15343/30720, 2717/5440, 8167/16352, 2725/5456,
-    8179/16376, 909/1820, 4091/8191, 15855/31744, 12275/24576,
-    16111/32256, 14321/28672, 16239/32512, 959/1920, 16335/32704,
-    16351/32736, 16359/32752, 16363/32760, 16365/32764, 8183/16383,
-    991/1984, 16367/32767, 1007/2016, 1015/2032, 1019/2040, 1021/2044,
-    511/1023, 15857/31744, 5371/10752, 16241/32512, 1087/2176,
-    16337/32704, 5451/10912, 16361/32752, 1091/2184, 16367/32764,
-    7673/15360, 14323/28672, 12277/24576, 16369/32767, 7929/15872,
-    1151/2304, 8121/16256, 8153/16320, 1167/2336, 8177/16368,
-    8181/16376, 1169/2340, 15347/30720, 3581/7168, 15859/31744,
-    6139/12288, 16115/32256, 16243/32512, 16307/32640, 16339/32704,
-    16355/32736, 16363/32752, 1259/2520, 16369/32764, 8185/16383,
-    1279/2560, 14325/28672, 16371/32767, 3965/7936, 1343/2688,
-    4061/8128, 1359/2720, 4085/8176, 1363/2728, 4091/8188,
-    15349/30720, 7163/14336, 15861/31744, 16117/32256, 16245/32512,
-    16309/32640, 16341/32704, 1487/2976, 16365/32752, 16369/32760,
-    16371/32764, 1535/3072, 2339/4681, 7931/15872, 14327/28672,
-    8059/16128, 8123/16256, 1631/3264, 8171/16352, 8179/16368,
-    8183/16376, 1637/3276, 4093/8191, 5117/10240, 12281/24576,
-    15863/31744, 1791/3584, 16247/32512, 5437/10880, 16343/32704,
-    5453/10912, 16367/32752, 1819/3640, 16373/32764, 2729/5461,
-    1919/3840, 16375/32767, 1983/3968, 2015/4032, 2031/4064,
-    2039/4080, 2043/4088, 2045/4092, 1023/2047, 15353/30720,
-    15865/31744, 2303/4608, 16249/32512, 16313/32640, 2335/4672,
-    16361/32736, 16369/32752, 2339/4680, 16375/32764, 7165/14336,
-    12283/24576, 16377/32767, 2559/5120, 7933/15872, 2687/5376,
-    8125/16256, 2719/5440, 8173/16352, 2727/5456, 8185/16376,
-    2729/5460, 14331/28672, 3071/6144, 15867/31744, 16123/32256,
-    16251/32512, 3263/6528, 16347/32704, 16363/32736, 16371/32752,
-    3275/6552, 16377/32764, 8189/16383, 3583/7168, 16379/32767,
-    3839/7680, 3967/7936, 4031/8064, 4063/8128, 4079/8160, 4087/8176,
-    4091/8184, 4093/8188, 2047/4095, 14333/28672, 5119/10240,
-    15869/31744, 5375/10752, 16253/32512, 5439/10880, 16349/32704,
-    5455/10912, 16373/32752, 5459/10920, 16379/32764, 6143/12288,
-    16381/32767, 7167/14336, 7679/15360, 7935/15872, 8063/16128,
-    8127/16256, 8159/16320, 8175/16352, 8183/16368, 8187/16376,
-    8189/16380, 4095/8191, 12287/24576, 14335/28672, 15359/30720,
-    15871/31744, 16127/32256, 16255/32512, 16319/32640, 16351/32704,
-    16367/32736, 16375/32752, 16379/32760, 16381/32764, 8191/16383,
-    16383/32767, 1/2 ];
-    fi;
-
-    MasterSlave(function() # iterator
-        local i, new;
-
-	if IsBound(job) then
-	    if job=[] then
-		return NOTASK;
-	    else
-		i := Remove(job,1);
-		Add(points,[i,fail]);
-		return i;
-	    fi;
-	fi;
-
-        i := Length(points);
-        if i=0 then
-            Add(points,[0,fail]);
-            return 0;
-        fi;
-        if points[i][1]<1 and IsInt(mindenom*points[i][1]) then
-            Add(points,[points[i][1]+1/mindenom,fail]);
-            return points[i+1][1];
-        fi;
-	i := 2; while i <= Length(points) do
-            if ForAll(points{[i-1,i]},p->DenominatorRat(p[1])<maxdenom and p[2]<>fail) then # something to subdivide
-                if false and IS_COMPLEX(points[i-1][2]) and IS_COMPLEX(points[i][2]) and AbsoluteValue(points[i][2]-points[i-1][2])<mindist then
-		    i := i+1;
-		    continue;
-		fi; # don't waste time here, points are very close
-		new := (points[i-1][1]+points[i][1])/2;
-                Add(points,[new,fail],i);
-                return new; # new task
-            fi;
-	    i := i+1;
-        od;
-        return NOTASK; # done
-    end,
-    task, # task
-      function(input,output) # check result, save locally
-        points[PositionProperty(points,x->x[1]=input)][2] := i2c(output);
-	Info(InfoFR,1,input," gives ",output," ",i2c(output));
-        return NO_ACTION;
-    end,
-      Error); # update data
-
-    return points;
-end);
-
-################################################################
-points := makemeone(mindenom,maxdenom,mindist,maxpcset,type);
-
-file := Concatenation(type,"-",String(maxpcset));
-PrintTo(file,"# gnuplot data -- maxpcset=",maxpcset," type=",type,"\n");
-#file := Concatenation(type,"-",String(maxdenom));
-#PrintTo(file,"# gnuplot data -- maxdenom=",mindenom," maxdenom=",maxdenom," mindist=",mindist," type=",type,"\n");
-lastinfinity := true;
-for i in [1..Length(points)] do
-    if IsInt(points[i][2]) then
-	real := infinity;
-	imag := infinity;
-	lastinfinity := true;
-    else
-	if not lastinfinity and AbsoluteValue(points[i-1][2]-points[i][2])>10*mindist then
-	    AppendTo(file,"infinity\t0\n"); # a jump in gnuplot
-	fi;
-	real := RealPart(points[i][2]);
-	imag := ImaginaryPart(points[i][2]);
-	lastinfinity := false;
-    fi;
-    AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(6,MacFloat(points[i][1])),"\n");
-od;
-# hubbard.g . . . . . . . . . . . . . . . . . . . . . . . . . ends here
-# recover angles:
-# awk '$1=="master" {n=substr($3,1,length($3)-1); angle[n]=$4; split($4,a,"/"); if(length(a)==1)a[2]=1; angleval[n]=1.0*a[1]/a[2]} $3=="master:" {if(NF==7){printf "%.10g\t%.10g\t%s\t%g\n",substr($5,1,length($5)-1)/10000000000.0,$6/10000000000.0,angle[$1],angleval[$1]}else{print "infinity\tinfinity\t" angle[$1] "\t" angleval[$1]}}' < log.
-# awk '{split($3,a,"/");if(a[2]==0)a[2]=1;b=a[1]*16384/a[2];seen[b]++} END{for(i=1;i<=11702;i++) if(seen[i]!=1) print i ",";for(i=14043;i<=16384;i++) if(seen[i]!=1) print i ","}' < rabbit-temp >
-
-if false then
-
-MakeReadWriteGlobal("ErrorInner");
-ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-
-hard := [8199, 8850, 9349, 9457, 9785, 9800, 10508, 10628, 10822,
-11279, 11308, 11573, 11618, 11690, 14082, 14139, 14211, 14383,
-14457, 14685, 14779, 15085, 15700];
-
-points := [];
-
-for angle in angles2 do
-  v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[1/7]))]:param_v:=3);
-  Info(InfoFR,1,"Angle ",angle,": spider converged to ",v);
-  Add(points,[angle,v]);
-od;
-
-file := "xx";
-PrintTo(file,"");
-for i in [1..Length(points)] do
-real := STRING_DIGITS_MACFLOAT(10,RealPart(points[i][2]));
-imag := STRING_DIGITS_MACFLOAT(10,ImaginaryPart(points[i][2]));
-AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(6,MacFloat(points[i][1])),"\n");
-od;
-fi;
-a2c(x,y) = 2*(x+{0,1}*y)/(x+{0,1}*y+1)
-
-plot [-0.7:3.75] [-1.98:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'airplane-13'  using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'rabbit-11-16384'  using (real(a2c($1,-$2))):(imag(a2c($1,-$2))) with lines
-set term pdfcairo size 29.7cm,21cm
-set out "wittner.pdf"
-replot
-set term png size 1112,990
-set out "wittner.png"
-replot
-plot [0.43:1.9] [0.5:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):($4 > 0.33333 && $4 < 0.666666 ? imag(a2c($1,$2)):1/0):(150+($4-0.333333)*150*3) with lines linew 2.0 palette,'airplane-13'  using (real(a2c($1,$2))):($4 > 0.142857 && $4 < 0.285715 ? imag(a2c($1,$2)):1/0):(30+($4-0.285714)*1000) with lines linew 2.0 palette
-
-# awk 'BEGIN{printf "points := ["} NF==8 && $3=="gives" {print "[" $2 ",Complex(\"" $8 "\")],"} END{print "fail];Remove(points);"}' < log.*
\ No newline at end of file
diff --git a/sandbox/cui b/sandbox/cui
deleted file mode 100644
index faade28..0000000
--- a/sandbox/cui
+++ /dev/null
@@ -1,8 +0,0 @@
-FUNCTION 0. 0. 0. 0. 0. 0. 0. 0. 0.30789240450753436 6.0152917044142162 -20.475816711813557 -25.925324552303728 78.24741584661507 27.909526223768339 -129.58974592903056 20.784538562962315 118.37323665219498 -86.830785207675902 -53.955794245378087 106.59656614547917 0.26300742130383992 -70.622950700033059 13.505019079222286 26.413784845555799 -6.675214517621491 -4.340647022167162 0.99999999999999956 1.6653345369377348e-16 1. 0. -6.3247854823785072 4.340647022167162 11.402444867764377 -25.673979420450138 5.7459408702694716 66.554020861951884 -61.788972147334505 -95.801827521643531 123.82079903668222 69.914923303584487 -129.31774095487197 -4.4733621643695773 74.474991285622195 -37.057431164250289 -17.704785071245755 28.212300787424216 -0.30789240450753352 -6.0152917044142153 0. 0. 0. 0. 0. -0. 0. 0.
-CYCLES 0. 0. 0 1 Infinity any 1 1 1 0 2 1
-IMAGE 1000 200
-POINTS 3
-0 0 1 2.0 0+0i
-0 0 -1 2.0 infty
-1 0 0 2.0 1+0i
-ARCS 0
diff --git a/sandbox/cui-plot b/sandbox/cui-plot
deleted file mode 100644
index cf6aea0..0000000
--- a/sandbox/cui-plot
+++ /dev/null
@@ -1,8 +0,0 @@
-FUNCTION 0. 0. 0. 0. -48.238523396263687 -89.683334081191859 -282.82502815993655 788.08808787695557 2762.7675707508233 -1433.0927619313384 -6759.4134500560585 -1372.2000763056258 6809.7662668555486 7299.0240229205565 -1727.1700096578707 -9615.3483664488758 -2348.6147359544166 6019.348705054188 2339.7994534347426 -1652.8345192378067 -882.02262910962827 -59.656838283206994 133.81347680297776 143.83786504922526 2.1376084900817034 -27.48278461287526 -2.0189609510572804 1.0859508745015549 -2.0189609510571835 1.085950874501586 24.108883873663515 13.365423244354005 -46.252698894775662 -190.93471617537116 -436.40997222604642 768.81024496107636 2668.7987450649603 -1041.1708258578915 -6316.9126161518152 -1358.3685107075376 7070.639477170289 6741.2237638510724 -2336.3751134774893 -9705.1542813854139 -2580.987940879274 6396.178897376727 2718.6014976430879 -1515.2047423718807 -813.44878551887837 -198.42858701634913 48.238523396280442 89.683334081211541 0. 0. 0. 0.
-CYCLES 0. 0. 0 1 1. 0. 1 1 Infinity any 2 1
-IMAGE 1000 200
-POINTS 3
-0 0 1 2.0 0+0i
-1 0 0 2.0 1+0i
-0 0 -1 2.0 P1infinity
-ARCS 0
diff --git a/sandbox/cui.g b/sandbox/cui.g
deleted file mode 100644
index 8c857e8..0000000
--- a/sandbox/cui.g
+++ /dev/null
@@ -1,135 +0,0 @@
-algrel := function(x,d,n)
-    local p, q, i;
-    
-    x := Rat(x); p := NumeratorRat(x); q := DenominatorRat(x);
-    x := IdentityMat(n+1);
-    for i in [0..n] do Add(x[i+1],p^i*q^(n-i)); od;
-    return LLLReducedBasis(x).basis[1];
-end;
-
-soln := 3; # any in [1..6]
-perm := [1,1,1]; # any in [[1..3],[1..3],[1..3]]
-perm := [2,2,1]; # correct
-
-#soln := 3;
-#perm := [3,3,3]; # causes bug
-#perm := [2,2,2]; # causes bug
-#perm := [1,1,1]; # causes bug
-#perm := [1,1,2]; # infinite loop
-
-# ai are preimages of infinity, bi of 1, ci of 0. 
-# a1=infty, b1=1, c1=0.
-if soln=1 then
-a2 := P1Point("+0.149750988166109653860411466689","-0.806809742242423799079921506905");
-a3 := P1Point("0.499046641161429957841320419874","0.604078889442426705726508431979");
-a4 := P1Point("0.485185122197580682846591564615","-0.288756708580057944346680022170");
-a5 := P1Point("1.02735045844322366967871049207","-0.692627699569478869878285069882");
-b2 := P1Point("+0.777608767128922641778045840101","-1.19817181487083654346423971979");
-b3 := P1Point("0.187165984623895974976914288641","0.983907772962233247454385420743");
-b4 := P1Point("-0.521982094516188118463771013047","-0.905803826258522000508937519103");
-b5 := P1Point("0.330795700388161565609750941806","-0.451169735481037621170010809820");
-c2 := P1Point("0.618873615669910693043298745446","-0.587255328015395889389933046733");
-c3 := P1Point("0.813413480615653046025694010969","0.980861597908046008477706710065");
-c4 := P1Point("-0.0569230590241632245485745470127","-1.44152930767901324517825995119");
-c5 := P1Point("1.47759189609289752374789539543","-0.828772809289520118635469676643");
-l := P1Point("-0.307892404507534353810254412579","-6.01529170441421636804484163487");
-elif soln=2 then    
-a2 := P1Point("0.149750988166109653860411466689","0.806809742242423799079921506905");
-a3 := P1Point("0.485185122197580682846591564615","0.288756708580057944346680022170");
-a4 := P1Point("1.02735045844322366967871049207","0.692627699569478869878285069882");
-a5 := P1Point("0.499046641161429957841320419874","-0.604078889442426705726508431979");
-b2 := P1Point("0.777608767128922641778045840101","1.19817181487083654346423971979");
-b3 := P1Point("0.330795700388161565609750941806","0.451169735481037621170010809820");
-b4 := P1Point("-0.521982094516188118463771013047","0.905803826258522000508937519103");
-b5 := P1Point("0.187165984623895974976914288641","-0.983907772962233247454385420743");
-c2 := P1Point("0.618873615669910693043298745446","0.587255328015395889389933046733");
-c3 := P1Point("1.47759189609289752374789539543","0.828772809289520118635469676643");
-c4 := P1Point("-0.0569230590241632245485745470127","1.44152930767901324517825995119");
-c5 := P1Point("0.813413480615653046025694010969","-0.980861597908046008477706710065");
-l  := P1Point("-0.307892404507534353810254412579","6.01529170441421636804484163487");
-elif soln=3 then
-a2 := P1Point("0.500000000000000000000000000000","-0.439846359796987134487167714627");
-a3 := P1Point("1.61268567872451072013417667720","-0.490182463946729812334860743821");
-a4 := P1Point("0.500000000000000000000000000000","-0.0415300696430258467988035191529");
-a5 := P1Point("-0.612685678724510720134176677204","-0.490182463946729812334860743821");
-b2 := P1Point("-0.127485151459011948734747094655","-0.991840479188802206853242764751");
-b3 := P1Point("0.432359588377624320446470035702","-0.172536644477962176299255320022");
-b4 := P1Point("-0.986296566330715829847015755165","-0.164982069462835473582606346591");
-b5 := P1Point("1.99516470514160943250266636145","-0.796186860797306011242450678339");
-c2 := P1Point("1.12748515145901194873474709466","-0.991840479188802206853242764751");
-c3 := P1Point("-0.995164705141609432502666361446","-0.796186860797306011242450678339");
-c4 := P1Point("1.98629656633071582984701575517","-0.164982069462835473582606346591");
-c5 := P1Point("0.567640411622375679553529964298","-0.172536644477962176299255320022");
-l  := P1Point("0","7.69070477812435423714369570274");
-elif soln=4 then
-a2 := P1Point("0.500000000000000000000000000000","0.439846359796987134487167714627");
-a3 := P1Point("1.61268567872451072013417667720","0.490182463946729812334860743821");
-a4 := P1Point("0.500000000000000000000000000000","0.0415300696430258467988035191529");
-a5 := P1Point("-0.612685678724510720134176677204","0.490182463946729812334860743821");
-b2 := P1Point("-0.127485151459011948734747094655","0.991840479188802206853242764751");
-b3 := P1Point("0.432359588377624320446470035702","0.172536644477962176299255320022");
-b4 := P1Point("-0.986296566330715829847015755165","0.164982069462835473582606346591");
-b5 := P1Point("1.99516470514160943250266636145","0.796186860797306011242450678339");
-c2 := P1Point("1.12748515145901194873474709466","0.991840479188802206853242764751");
-c3 := P1Point("1.98629656633071582984701575517","0.164982069462835473582606346591");
-c4 := P1Point("0.567640411622375679553529964298","0.172536644477962176299255320022");
-c5 := P1Point("-0.995164705141609432502666361446","0.796186860797306011242450678339");
-l  := P1Point("-7.69070477812435423714369570274","0");
-elif soln=5 then
-a2 := P1Point("0.850249011833890346139588533311","-0.806809742242423799079921506905");
-a3 := P1Point("0.500953358838570042158679580125","0.604078889442426705726508431980");
-a4 := P1Point("-0.0273504584432236696787104920724","-0.692627699569478869878285069885");
-a5 := P1Point("0.514814877802419317153408435385","-0.288756708580057944346680022169");
-b2 := P1Point("0.381126384330089306956701254554","-0.587255328015395889389933046733");
-b3 := P1Point("0.186586519384346953974305989030","0.980861597908046008477706710065");
-b4 := P1Point("-0.477591896092897523747895395425","-0.828772809289520118635469676642");
-b5 := P1Point("1.05692305902416322454857454701","-1.44152930767901324517825995119");
-c2 := P1Point("0.222391232871077358221954159899","-1.19817181487083654346423971979");
-c3 := P1Point("0.812834015376104025023085711358","0.983907772962233247454385420741");
-c4 := P1Point("0.669204299611838434390249058194","-0.451169735481037621170010809822");
-c5 := P1Point("1.52198209451618811846377101305","-0.905803826258522000508937519100");
-l  := P1Point("0.307892404507534353810254412579","-6.01529170441421636804484163487");
-elif soln=6 then
-a2 := P1Point("0.850249011833890346139588533311","0.806809742242423799079921506905");
-a3 := P1Point("0.514814877802419317153408435385","0.288756708580057944346680022169");
-a4 := P1Point("-0.0273504584432236696787104920724","0.692627699569478869878285069885");
-a5 := P1Point("0.500953358838570042158679580125","-0.604078889442426705726508431980");
-b2 := P1Point("0.381126384330089306956701254554","0.587255328015395889389933046733");
-b3 := P1Point("-0.477591896092897523747895395425","0.828772809289520118635469676642");
-b4 := P1Point("1.05692305902416322454857454701","1.44152930767901324517825995119");
-b5 := P1Point("0.186586519384346953974305989030","-0.980861597908046008477706710065");
-c2 := P1Point("0.222391232871077358221954159899","1.19817181487083654346423971979");
-c3 := P1Point("0.669204299611838434390249058194","0.451169735481037621170010809822");
-c4 := P1Point("1.52198209451618811846377101305","0.905803826258522000508937519100");
-c5 := P1Point("0.812834015376104025023085711358","-0.983907772962233247454385420741");
-l  := P1Point("0.307892404507534353810254412579","6.01529170441421636804484163487");
-else
-Error("Specify soln; 3 is the correct one");    
-fi;
-pre := MoebiusMap(ValueGlobal(Concatenation("a",String(perm[1]+2))),
-               ValueGlobal(Concatenation("b",String(perm[2]+2))),
-               ValueGlobal(Concatenation("c",String(perm[3]+2))),
-               P1infinity,P1one,P1zero);
-
-z := P1z;
-#s := (b3-c3)*z+(a3-b3);
-#t := a3*(b3-c3)*z+(a3-b3)*c3;
-
-zeros := List([P1Point(0),c2,c3,c4,c5],x->P1Image(pre,x));
-poles := List([P1infinity,a2,a3,a4,a5],x->P1Image(pre,x));
-
-f := P1MapByZerosPoles(zeros{[1,1,1,1,2,2,2,3,3,4,4,5,5]},poles{[1,1,1,1,2,2,2,3,3,4,4,5,5]},P1one,P1one);
-@FR.p1eps := 1.e-4_l;
-fmap := f;
-m := IMGMachine(f);
-perms := List([1..3],i->PermList(Output(m,i)));
-goal := [(1,3,12,4)(5,9)(6,7)(10,13,11)(2,8),
-         (1,5,13,6)(7,10)(2,3)(8,11,12)(4,9),
-         (1,7,11,2)(3,8)(4,5)(9,12,13)(6,10)];
-change := RepresentativeAction(SymmetricGroup(13),perms,goal,OnTuples);
-if change=fail then
-    Print("fail\n");
-else
-    Print("success\n");
-    newm := ChangeFRMachineBasis(m,change);
-fi;
diff --git a/sandbox/examples-rat b/sandbox/examples-rat
deleted file mode 100644
index 28b8f20..0000000
--- a/sandbox/examples-rat
+++ /dev/null
@@ -1,25 +0,0 @@
-A. Quadratic polynomials
-1. z^2 - 1 (attracting 2-cycle)
-2. z^2 + 0.6i (attracting fixed point; the Julia set is a fractal closed curve)
-3. z^2 + 0.7i (Cantor set; do backward iteration)
-4. z^2 + i (dendrite; do backward iteration)
-5. z^2 - 0.122561 + 0.744862i (attracting 3-cycle; ?Douady?s rabbit?)
-6. z^2 + 0.3590310628366145 + 0.1009348768642975i (attracting 8-cycle)
-7. z^2 + 0.25 (observe the ?flow pattern? near the parabolic fixed point)
-8. z^2 + 0.255 (view the bifurcation)
-9. exp(1.1994i)z + z^2 (Siegel disk)
-10. z^2 - 1.40114 (near the Fiegenbaum point; do backward iteration)
-11. z^2 - 1.754878 (?Airplane set?; do backward iteration)
-
-B. Examples of higher degree
-12. z + z^2 - 0.5z^3 (two attracting fixed points)
-13. z^3 + i (?Mouse Queen?; attracting 2-cycle)
-14. z^3 - 1.2z + .77 (neither connected, nor totally disconnected)
-15. (1 + 0.1i)(z - z^3/6 + z^5/120) (attempt to model (1 + 0.1i)sinz)
-
-C. Rational functions
-12. z^2 + 0.15/z
-13. z^2 + .03/z
-14. z^2 + .1/z^2
-15. 1 - 2/z^2 (Julia set is the whole plane)
-16. 1/z + z + 0.0001z^7 (4 attracting fixed points)
diff --git a/sandbox/henon.pdf b/sandbox/henon.pdf
deleted file mode 100755
index 1a41c5e..0000000
Binary files a/sandbox/henon.pdf and /dev/null differ
diff --git a/sandbox/hubbard.g b/sandbox/hubbard.g
deleted file mode 100755
index fbe6e90..0000000
--- a/sandbox/hubbard.g
+++ /dev/null
@@ -1,398 +0,0 @@
-#!/bin/sh
-tail -n +4 $0 | pargap -r -q > log.$$ 2>&1
-exit
-################################################################
-# Compute images, in parameter space, of Misiurewicz points,
-# or of matings of Misiurewicz polynomials with rabbit/corabbit/airplane
-#
-mindenom := 8; # minimal denominator; all i/mindenom will be computed
-maxdenom := 2^14; # maximal denominator
-mindist := 1/10; # subdivide as long as denominator is small enough and
-                 # distance between neighbouring points is >mindist
-type := "airplane";
-
-maxpcset := 16; # maximal number of post-critical points
-################################################################
-
-#ParReset();
-ParEval("LoadPackage(\"fr\")");
-#ParEval("SetInfoLevel(InfoFR,2)");
-ParEval("EPS@fr.maxratio := MacFloat(16/10)");
-
-################################################################
-ParInstallTOPCGlobalFunction("makemeone", function(mindenom,maxdenom,mindist,maxpcset,type)
-    local points, i, j, idle, c2i, i2c, obstructed, task, angle2, job;
-    
-    c2i := function(c)
-        if IsInt(c) then return c; fi;
-        return [Int(10^10*RealPart(c)),Int(10^10*ImaginaryPart(c))];
-    end;
-    i2c := function(i)
-        if IsInt(i) then return i; fi;
-        return Complex(i[1]/10^10,i[2]/10^10);
-    end;
-    MakeReadWriteGlobal("ErrorInner");
-    ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-    if type="mandelbrot" then
-	task := function(angle)
-            local v;
-            v := CALL_WITH_CATCH(RationalFunction,[PolynomialIMGMachine(2,[angle],false)]:param_unicritical);
-	    if not v[1] then # gap error
-		return 1;
-	    elif IsRationalFunction(v[2]) then # z^2+c
-		return c2i(Value(v[2],0));
-	    elif IsRecord(v[2]) then # obstruction
-		return 0;
-	    else # fr error
-		return 1;
-	    fi;
-	end;
-    else # points in slice v3
-        if type="rabbit" then
-            angle2 := 1/7;
-        elif type="airplane" then
-            angle2 := 3/7;
-        elif type="corabbit" then
-            angle2 := 5/7;
-        fi;
-        obstructed := [1-angle2-1/7,1-angle2];
-        task := function(angle)
-            local v;
-	    if angle >= obstructed[1] and angle <= obstructed[2] then
-		return 0; # we know it's an obstruction
-	    fi;
-            v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[angle2]))]:param_v:=3,runtime:=Runtime()+3600*1000);
-	    Info(InfoFR,1,"Spider converged to ",v," on ",MPI_Comm_rank());
-            if not v[1] then
-                return 1; # gap error
-            elif IsRationalFunction(v[2]) then # 1 - (1+a)z^-1 + az^-2
-                return c2i(CoefficientsOfUnivariateLaurentPolynomial(v[2])[1][1]);
-            elif IsRecord(v[2]) then
-		return 0; # obstruction
-	    else
-                return 1; # fr error
-            fi;
-        end;
-    fi;
-
-    points := [];
-
-    job := [];
-    # classical job
-    for i in Combinations([0..maxpcset],2) do
-	j := 2^i[2]-2^i[1];
-	Append(job,[0..j-1]/j);
-    od;
-    j := AsSortedList(job);
-    job := [];
-    for i in [1..Length(j)] do
-	if i=1 or j[i]<>j[i-1] then
-	    Add(job,j[i]);
-	fi;
-    od;
-
-    # Hamal Hubbard's question: only points in [2/7,1/3]
-    if true then
-	job := Filtered(job,angle->IsEvenInt(DenominatorRat(angle)) and angle >= 2/7 and angle <= 1/3);
-job := [
-#  10847/32764, 1801/5440, 10679/32256, 18985/57344, 21655/65408, 21695/65528, 4339/13104, 
-#  10853/32768, 21685/65472, 7237/21844, 10851/32752, 4327/13056, 20369/61440, 10861/32760, 
-#  21685/65408, 10865/32768, 21725/65504, 21733/65528, 10783/32512, 7217/21760, 21715/65472, 
-#  21057/63488, 4755/14336, 21653/65280, 10869/32768, 7239/21824, 19021/57344, 9511/28672, 
-#  21697/65408, 21729/65504, 21737/65528, 21739/65534, 2675/8064, 20381/61440, 10785/32512, 
-#  4331/13056, 5435/16384, 21719/65472, 69/208, 21739/65532, 21061/63488, 10849/32704, 
-  19023/57344, 10865/32752, 10869/32764, 21401/64512, 3397/10240, 21571/65024, 2707/8160, 
-  905/2728, 209/630, 8153/24576, 10531/31744, 21699/65408, 21731/65504, 21739/65528, 21741/65534, 
-  1189/3584, 5393/16256, 20383/61440, 7219/21760, 10871/32768, 21721/65472, 21737/65520, 
-  7247/21844, 21063/63488, 775/2336, 5433/16376, 5435/16382, 16307/49152, 21403/64512, 
-  19025/57344, 21573/65024, 637/1920, 10861/32736, 3623/10920, 10871/32766, 21701/65408, 
-  2633/7936, 21733/65504, 21741/65528, 21743/65534, 5351/16128, 10787/32512, 21659/65280, 
-  1359/4096, 7241/21824, 21739/65520, 21743/65532, 10851/32704, 21065/63488, 10867/32752, 
-  10871/32764, 7135/21504, 21575/65024, 361/1088, 10193/30720, 19027/57344, 5431/16368, 
-  1087/3276, 16309/49152, 21703/65408, 10533/31744, 945/2848, 21743/65528, 21745/65534, 
-  1529/4608, 2697/8128, 21661/65280, 10873/32768, 20387/61440, 1975/5952, 4757/14336, 7247/21840, 
-  21745/65532, 2713/8176, 21067/63488, 2717/8188, 8155/24576, 21407/64512, 21577/65024, 
-  10831/32640, 1699/5120, 3621/10912, 1553/4680, 10873/32766, 19029/57344, 21705/65408, 
-  5267/15872, 21737/65504, 21745/65528, 21747/65534, 223/672, 10789/32512, 7221/21760, 
-  5437/16384, 21727/65472, 20389/61440, 21743/65520, 7249/21844, 10853/32704, 9515/28672, 
-  10869/32752, 21069/63488, 10873/32764, 21409/64512, 21579/65024, 677/2040, 679/2046, 2039/6144, 
-  3101/9344, 21739/65504, 21747/65528, 3107/9362, 10535/31744, 19031/57344, 10705/32256, 
-  5395/16256, 4333/13056, 10875/32768, 7243/21824, 4349/13104, 21749/65532, 6797/20480, 
-  5427/16352, 5435/16376, 5437/16382, 16313/49152, 21071/63488, 2379/7168, 21581/65024, 
-  3611/10880, 10865/32736, 10873/32760, 3625/10922, 2549/7680, 21709/65408, 21741/65504, 
-  21749/65528, 21751/65534, 1317/3968, 5353/16128, 10791/32512, 21667/65280, 2719/8192, 701/2112, 
-  7249/21840, 21751/65532, 10855/32704, 20393/61440, 10871/32752, 10875/32764, 21073/63488, 
-  3059/9216, 21583/65024, 5417/16320, 9517/28672, 1811/5456, 5437/16380, 16315/49152, 
-  21711/65408, 3399/10240, 21743/65504, 21751/65528, 21753/65534, 10537/31744, 3569/10752, 
-  1349/4064, 7223/21760, 10877/32768, 21733/65472, 19035/57344, 239/720, 7251/21844, 1357/4088, 
-  1359/4094, 4079/12288, 21075/63488, 21415/64512, 21585/65024, 2167/6528, 10867/32736, 725/2184, 
-  10877/32766, 4759/14336, 21713/65408, 21745/65504, 21753/65528, 21755/65534, 5099/15360, 
-  5269/15872, 2677/8064, 10793/32512, 21671/65280, 5439/16384, 7245/21824, 21751/65520, 
-  21755/65532, 1551/4672, 19037/57344, 10873/32752, 10877/32764, 6799/20480, 21077/63488, 
-  7139/21504, 21587/65024, 903/2720, 247/744, 2719/8190, 8159/24576, 21715/65408, 21747/65504, 
-  21755/65528, 21757/65534, 9519/28672, 10199/30720, 10539/31744, 10709/32256, 5397/16256, 
-  21673/65280, 10879/32768, 21737/65472, 2417/7280, 21757/65532, 5429/16352, 5437/16376, 
-  5439/16382, 16319/49152, 19039/57344, 20399/61440, 21079/63488, 21419/64512, 21589/65024, 
-  10837/32640, 3623/10912, 10877/32760, 253/762, 21717/65408, 21749/65504, 21757/65528, 
-  21759/65534, 85/256, 21739/65472, 4351/13104, 7253/21844, 10859/32704, 10875/32752, 
-  10879/32764, 5419/16320, 21591/65024, 21421/64512, 21081/63488, 20401/61440, 19041/57344, 
-  5435/16368, 259/780, 16321/49152, 21719/65408, 21751/65504, 21759/65528, 21761/65534, 
-  10881/32768, 21677/65280, 2699/8128, 10711/32256, 10541/31744, 10201/30720, 7247/21824, 
-  9521/28672, 21757/65520, 21761/65532, 2715/8176, 2719/8188, 8161/24576, 3613/10880, 
-  21593/65024, 7141/21504, 21083/63488, 6801/20480, 10871/32736, 10879/32760, 3627/10922, 
-  19043/57344, 3103/9344, 21753/65504, 21761/65528, 3109/9362, 5441/16384, 21679/65280, 
-  10797/32512, 1339/4032, 5271/15872, 21743/65472, 5101/15360, 7253/21840, 21763/65532, 
-  10861/32704, 4761/14336, 10877/32752, 10881/32764, 271/816, 21595/65024, 21425/64512, 
-  21085/63488, 453/1364, 4081/12288, 21723/65408, 21755/65504, 21763/65528, 21765/65534, 
-  19045/57344, 10883/32768, 7227/21760, 5399/16256, 3571/10752, 10543/31744, 21745/65472, 
-  21761/65520, 7255/21844, 3401/10240, 5431/16352, 5439/16376, 5441/16382, 16325/49152, 
-  9523/28672, 10841/32640, 21597/65024, 3061/9216, 21087/63488, 10873/32736, 93/280, 10883/32766, 
-  20407/61440, 21725/65408, 21757/65504, 21765/65528, 21767/65534, 2721/8192, 21683/65280, 
-  10799/32512, 5357/16128, 659/1984, 3109/9360, 21767/65532, 10863/32704, 2551/7680, 473/1424, 
-  10883/32764, 1807/5440, 21599/65024, 2381/7168, 5437/16368, 21089/63488, 5441/16380, 
-  16327/49152, 21727/65408, 6803/20480, 21759/65504, 21767/65528, 21769/65534, 10885/32768, 
-  4337/13056, 675/2032, 10715/32256, 21749/65472, 19049/57344, 1451/4368, 10545/31744, 
-  21769/65532, 97/292, 2041/6144, 10843/32640, 21601/65024, 21431/64512, 3625/10912, 10883/32760, 
-  10885/32766, 21091/63488, 9525/28672, 21729/65408, 21761/65504, 21769/65528, 21771/65534, 
-  20411/61440, 5443/16384, 7229/21760, 10801/32512, 893/2688, 21751/65472, 21767/65520, 
-  7257/21844, 5273/15872, 10865/32704, 19051/57344, 10881/32752, 10885/32764, 1701/5120, 
-  2711/8160, 21603/65024, 21433/64512, 2719/8184, 907/2730, 8165/24576, 21093/63488, 21731/65408, 
-  21763/65504, 21771/65528, 21773/65534, 4763/14336, 20413/61440, 10887/32768, 21689/65280, 
-  5401/16256, 1531/4608, 7251/21824, 21769/65520, 21773/65532, 10547/31744, 5433/16352, 
-  5441/16376, 5443/16382, 16331/49152, 19053/57344, 10207/30720, 723/2176, 21605/65024, 
-  7145/21504, 10877/32736, 311/936, 3629/10922, 21095/63488, 21733/65408, 21765/65504, 
-  21773/65528, 21775/65534, 1361/4096, 21691/65280, 10803/32512, 5359/16128, 21755/65472, 
-  2419/7280, 21775/65532, 2637/7936, 10867/32704, 10883/32752, 10887/32764, 319/960, 21607/65024, 
-  19055/57344, 1813/5456, 21437/64512, 5443/16380, 16333/49152, 3105/9344, 21097/63488, 
-  21767/65504, 21775/65528, 3111/9362, 10889/32768, 7231/21760, 20417/61440, 2701/8128, 
-  21757/65472, 1191/3584, 21773/65520, 7259/21844, 2717/8176, 10549/31744, 2721/8188, 8167/24576, 
-  10847/32640, 21609/65024, 3403/10240, 989/2976, 21439/64512, 3629/10920, 10889/32766, 
-  19057/57344, 21737/65408, 21099/63488, 21769/65504, 21777/65528, 21779/65534, 5445/16384, 
-  4339/13056, 10805/32512, 20419/61440, 7253/21824, 335/1008, 21779/65532, 10869/32704, 
-  9529/28672, 10885/32752, 5275/15872, 10889/32764, 113/340, 21611/65024, 1021/3072, 21739/65408, 
-  21771/65504, 21779/65528, 21781/65534, 21101/63488, 19059/57344, 10891/32768, 21697/65280, 
-  5403/16256, 21761/65472, 1037/3120, 21781/65532, 10721/32256, 6807/20480, 5435/16352, 
-  5443/16376, 5445/16382, 16337/49152, 10551/31744, 4765/14336, 10849/32640, 21613/65024, 
-  117/352, 10889/32760, 10891/32766, 21443/64512, 10211/30720, 21741/65408, 21773/65504, 
-  21781/65528, 21783/65534, 21103/63488, 2723/8192, 7233/21760, 10807/32512, 21763/65472, 
-  21779/65520, 7261/21844, 1787/5376, 20423/61440, 1553/4672, 10887/32752, 10891/32764, 
-  1319/3968, 1085/3264, 9531/28672, 21615/65024, 5441/16368, 121/364, 16339/49152, 21445/64512, 
-  21743/65408, 851/2560, 21775/65504, 21783/65528, 21785/65534, 21105/63488, 10893/32768, 
-  21701/65280, 1351/4064, 7255/21824, 19063/57344, 21781/65520, 21785/65532, 10723/32256, 
-  1359/4088, 1361/4094, 4085/12288, 10553/31744, 3617/10880, 21617/65024, 10883/32736, 
-  10891/32760, 3631/10922, 2383/7168, 21745/65408, 21777/65504, 21785/65528, 21787/65534, 
-  10213/30720, 21107/63488, 5447/16384, 21703/65280, 10809/32512, 21767/65472, 7261/21840, 
-  21787/65532, 383/1152, 10873/32704, 19065/57344, 10889/32752, 10893/32764, 6809/20480, 
-  5277/15872, 2713/8160, 21619/65024, 907/2728, 389/1170, 8171/24576, 21449/64512, 21747/65408, 
-  21779/65504, 21787/65528, 21789/65534, 9533/28672, 5107/15360, 21109/63488, 10895/32768, 
-  1447/4352, 5405/16256, 1979/5952, 4357/13104, 7263/21844, 3575/10752, 5437/16352, 5445/16376, 
-  5447/16382, 16343/49152, 19067/57344, 20429/61440, 10555/31744, 10853/32640, 21621/65024, 
-  10885/32736, 3631/10920, 10895/32766, 21451/64512, 3107/9344, 947/2848, 21789/65528, 3113/9362, 
-  681/2048, 21707/65280, 10811/32512, 7257/21824, 21787/65520, 21791/65532, 5363/16128, 
-  10875/32704, 10891/32752, 10895/32764, 2639/7936, 20431/61440, 1809/5440, 19069/57344, 
-  21623/65024, 5443/16368, 419/1260, 16345/49152, 7151/21504, 21751/65408, 21783/65504, 
-  21791/65528, 703/2114, 10897/32768, 21113/63488, 1277/3840, 2703/8128, 21773/65472, 9535/28672, 
-  2421/7280, 21793/65532, 10727/32256, 2719/8176, 2723/8188, 8173/24576, 10557/31744, 2171/6528, 
-  6811/20480, 21625/65024, 3629/10912, 2179/6552, 10897/32766, 19071/57344, 3065/9216, 
-  21753/65408, 21785/65504, 21793/65528, 21795/65534, 5449/16384, 21115/63488, 7237/21760, 
-  10217/30720, 10813/32512, 21775/65472, 3113/9360, 7265/21844, 149/448, 10893/32752, 
-  10897/32764, 1357/4080, 5279/15872, 1361/4092, 21627/65024, 4087/12288, 21755/65408, 
-  21457/64512, 21787/65504, 21795/65528, 21797/65534, 19073/57344, 10899/32768, 21713/65280, 
-  21117/63488, 7259/21824, 5407/16256, 21793/65520, 21797/65532, 1703/5120, 777/2336, 
-  10729/32256, 5447/16376, 5449/16382, 16349/49152, 9537/28672, 3619/10880, 10559/31744, 
-  10889/32736, 21629/65024, 10897/32760, 3633/10922, 20437/61440, 21757/65408, 7153/21504, 
-  21789/65504, 21797/65528, 21799/65534, 2725/8192, 4343/13056, 21119/63488, 21779/65472, 
-  10815/32512, 1453/4368, 21799/65532, 10219/30720, 10879/32704, 5365/16128, 10895/32752, 
-  10899/32764, 4769/14336, 5429/16320, 165/496, 5449/16380, 21631/65024, 16351/49152, 
-  21759/65408, 6813/20480, 21791/65504, 21461/64512, 21799/65528, 21801/65534, 10901/32768, 
-  7239/21760, 19077/57344, 21781/65472, 21121/63488, 21797/65520, 169/508, 511/1536, 10859/32640, 
-  10891/32736, 173/520, 10901/32766, 21633/65024, 10561/31744, 9539/28672, 21761/65408, 
-  21793/65504, 21801/65528, 21803/65534, 21463/64512, 20441/61440, 5451/16384, 21719/65280, 
-  7261/21824, 21799/65520, 21803/65532, 10817/32512, 21123/63488, 19079/57344, 10881/32704, 
-  10897/32752, 10901/32764, 2683/8064, 3407/10240, 181/544, 2723/8184, 545/1638, 8177/24576, 
-  21635/65024, 5281/15872, 3109/9344, 21795/65504, 21803/65528, 3115/9362, 2385/7168, 
-  20443/61440, 10903/32768, 21721/65280, 21785/65472, 559/1680, 21805/65532, 5409/16256, 
-  21125/63488, 5441/16352, 5449/16376, 5451/16382, 16355/49152, 10733/32256, 19081/57344, 
-  5111/15360, 10861/32640, 3631/10912, 10901/32760, 10903/32766, 21637/65024, 10563/31744, 
-  21765/65408, 21797/65504, 21805/65528, 21807/65534, 21467/64512, 1363/4096, 7241/21760, 
-  21787/65472, 21803/65520, 7269/21844, 10819/32512, 21127/63488, 10883/32704, 10899/32752, 
-  10903/32764, 1789/5376, 10223/30720, 19083/57344, 5431/16320, 5447/16368, 1817/5460, 
-  16357/49152, 21639/65024, 2641/7936, 21767/65408, 21799/65504, 21807/65528, 21809/65534, 
-  3067/9216, 10905/32768, 20447/61440, 4345/13056, 4771/14336, 7263/21824, 623/1872, 21809/65532, 
-  2705/8128, 21129/63488, 2721/8176, 2725/8188, 8179/24576, 10735/32256, 213/640, 10895/32736, 
-  10903/32760, 3635/10922, 21641/65024, 19085/57344, 21769/65408, 10565/31744, 21801/65504, 
-  21809/65528, 21811/65534, 7157/21504, 5453/16384, 21727/65280, 20449/61440, 1981/5952, 
-  2423/7280, 21811/65532, 10821/32512, 9543/28672, 1555/4672, 21131/63488, 10901/32752, 
-  10905/32764, 671/2016, 679/2040, 227/682, 2045/6144, 21643/65024, 21771/65408, 21803/65504, 
-  21811/65528, 21813/65534, 5283/15872, 19087/57344, 21473/64512, 10907/32768, 7243/21760, 
-  703/2112, 21809/65520, 7271/21844, 6817/20480, 5411/16256, 5443/16352, 237/712, 5453/16382, 
-  16361/49152, 21133/63488, 1193/3584, 2173/6528, 10897/32736, 727/2184, 10907/32766, 
-  21645/65024, 5113/15360, 21773/65408, 245/736, 21813/65528, 21815/65534, 10567/31744, 
-  21475/64512, 2727/8192, 21731/65280, 7265/21824, 21811/65520, 21815/65532, 10823/32512, 
-  20453/61440, 10887/32704, 10903/32752, 10907/32764, 21135/63488, 767/2304, 9545/28672, 
-  1811/5440, 5449/16368, 779/2340, 16363/49152, 21647/65024, 3409/10240, 21775/65408, 
-  21807/65504, 21815/65528, 21817/65534, 1321/3968, 7159/21504, 10909/32768, 21733/65280, 
-  19091/57344, 21797/65472, 7271/21840, 21817/65532, 1353/4064, 1361/4088, 1363/4094, 4091/12288, 
-  21137/63488, 10739/32256, 10867/32640, 3633/10912, 839/2520, 10909/32766, 4773/14336, 
-  21649/65024, 3111/9344, 21809/65504, 21817/65528, 3117/9362, 2557/7680, 10569/31744, 
-  21479/64512, 5455/16384, 1449/4352, 21799/65472, 4363/13104, 7273/21844, 10825/32512, 
-  19093/57344, 10889/32704, 10905/32752, 10909/32764, 6819/20480, 21139/63488, 895/2688, 
-  2717/8160, 2725/8184, 303/910, 8183/24576, 21651/65024, 21779/65408, 21811/65504, 21819/65528, 
-  21821/65534, 9547/28672, 10229/30720, 5285/15872, 21481/64512, 10911/32768, 21737/65280, 
-  7267/21824, 21817/65520, 21821/65532, 5413/16256, 5445/16352, 5453/16376, 5455/16382, 
-  16367/49152, 19095/57344, 20459/61440, 21141/63488, 10741/32256, 3623/10880, 991/2976, 
-  10909/32760, 3637/10922, 21653/65024, 21781/65408, 21813/65504, 21821/65528, 21823/65534, 
-  341/1024, 21739/65280, 21803/65472, 1039/3120, 21823/65532, 10827/32512, 10891/32704, 
-  10907/32752, 10911/32764, 5371/16128, 21143/63488, 20461/61440, 19097/57344, 1087/3264, 
-  1817/5456, 1091/3276, 16369/49152, 21655/65024, 21783/65408, 21815/65504, 21823/65528, 
-  21825/65534, 10913/32768, 21485/64512, 2643/7936, 10231/30720, 7247/21760, 9549/28672, 
-  21805/65472, 21821/65520, 7275/21844, 2707/8128, 389/1168, 2727/8188, 8185/24576, 3581/10752, 
-  21145/63488, 6821/20480, 10871/32640, 10903/32736, 3637/10920, 10913/32766, 19099/57344, 
-  21657/65024, 21785/65408, 21817/65504, 21825/65528, 21827/65534, 5457/16384, 21487/64512, 
-  10573/31744, 1279/3840, 7269/21824, 21823/65520, 21827/65532, 10829/32512, 4775/14336, 
-  10893/32704, 10909/32752, 10913/32764, 1343/4032, 21147/63488, 453/1360, 1363/4092, 4093/12288, 
-  21659/65024, 21787/65408, 21819/65504, 21827/65528, 21829/65534, 19101/57344, 10915/32768, 
-  7163/21504, 5287/15872, 4349/13056, 21809/65472, 485/1456, 21829/65532, 3411/10240, 5415/16256, 
-  5447/16352, 5455/16376, 5457/16382, 16373/49152, 9551/28672, 1535/4608, 21149/63488, 
-  10873/32640, 3635/10912, 1559/4680, 10915/32766, 20467/61440, 21661/65024, 21789/65408, 
-  21821/65504, 21829/65528, 21831/65534, 2729/8192, 21491/64512, 10575/31744, 7249/21760, 
-  21811/65472, 1679/5040, 7277/21844, 5117/15360, 10831/32512, 10895/32704, 10911/32752, 
-  10915/32764, 597/1792, 5437/16320, 21151/63488, 5453/16368, 1819/5460, 16375/49152, 
-  21663/65024, 6823/20480, 3113/9344, 21823/65504, 21831/65528, 3119/9362, 10917/32768, 
-  21493/64512, 19105/57344, 21749/65280, 661/1984, 21829/65520, 21833/65532, 677/2032, 681/2044, 
-  2047/6144, 10747/32256, 725/2176, 10907/32736, 2183/6552, 3639/10922, 21153/63488, 9553/28672, 
-  21665/65024, 21793/65408, 21825/65504, 21833/65528, 21835/65534, 20471/61440, 5459/16384, 
-  7165/21504, 21751/65280, 21815/65472, 7277/21840, 21835/65532, 10577/31744, 19107/57344, 
-  10833/32512, 10897/32704, 10913/32752, 10917/32764, 853/2560, 2687/8064, 2719/8160, 909/2728, 
-  2729/8190, 8189/24576, 21155/63488, 21667/65024, 21795/65408, 949/2848, 21835/65528, 
-  21837/65534, 4777/14336, 20473/61440, 10919/32768, 3071/9216, 7251/21760, 21817/65472, 
-  3119/9360, 7279/21844, 5289/15872, 5417/16256, 5449/16352, 5457/16376, 5459/16382, 16379/49152, 
-  19109/57344, 10237/30720, 3583/10752, 10877/32640, 10909/32736, 1213/3640, 10919/32766, 
-  21157/63488, 21669/65024, 21797/65408, 21829/65504, 21837/65528, 21839/65534, 1365/4096, 
-  21499/64512, 4351/13056, 7273/21824, 4367/13104, 21839/65532, 10579/31744, 10835/32512, 
-  1557/4672, 10915/32752, 10919/32764, 5119/15360, 19111/57344, 5375/16128, 1813/5440, 
-  5455/16368, 5459/16380, 16381/49152, 21159/63488, 21671/65024, 21799/65408, 21831/65504, 
-  21839/65528, 21841/65534, 10921/32768, 20477/61440, 2389/7168, 21757/65280, 21821/65472, 
-  7279/21840, 21841/65532, 2645/7936, 2709/8128, 2725/8176, 2729/8188, 8191/24576, 3413/10240, 
-  10751/32256, 10879/32640, 3637/10912, 10919/32760, 10921/32766, 19113/57344, 21161/63488, 
-  21673/65024, 21801/65408, 21833/65504, 21841/65528, 21843/65534, 5461/16384, 20479/61440, 
-  21503/64512, 7253/21760, 21823/65472, 21839/65520, 7281/21844, 9557/28672, 10581/31744, 
-  10837/32512, 10901/32704, 10917/32752, 10921/32764 ];
-    fi;
-
-    # Xavier Buff's question: real polynomials with rabbit
-    if false then
-    fi;
-
-    MasterSlave(function() # iterator
-        local i, new;
-
-	if IsBound(job) then
-	    if job=[] then
-		return NOTASK;
-	    else
-		i := Remove(job,1);
-		Add(points,[i,fail]);
-		return i;
-	    fi;
-	fi;
-
-        i := Length(points);
-        if i=0 then
-            Add(points,[0,fail]);
-            return 0;
-        fi;
-        if points[i][1]<1 and IsInt(mindenom*points[i][1]) then
-            Add(points,[points[i][1]+1/mindenom,fail]);
-            return points[i+1][1];
-        fi;
-	i := 2; while i <= Length(points) do
-            if ForAll(points{[i-1,i]},p->DenominatorRat(p[1])<maxdenom and p[2]<>fail) then # something to subdivide
-                if false and IS_COMPLEX(points[i-1][2]) and IS_COMPLEX(points[i][2]) and AbsoluteValue(points[i][2]-points[i-1][2])<mindist then
-		    i := i+1;
-		    continue;
-		fi; # don't waste time here, points are very close
-		new := (points[i-1][1]+points[i][1])/2;
-                Add(points,[new,fail],i);
-                return new; # new task
-            fi;
-	    i := i+1;
-        od;
-        return NOTASK; # done
-    end,
-    task, # task
-      function(input,output) # check result, save locally
-        points[PositionProperty(points,x->x[1]=input)][2] := i2c(output);
-	Info(InfoFR,1,input," gives ",output," ",i2c(output));
-        return NO_ACTION;
-    end,
-      Error); # update data
-
-    return points;
-end);
-
-################################################################
-points := makemeone(mindenom,maxdenom,mindist,maxpcset,type);
-
-file := Concatenation(type,"-",String(maxpcset));
-PrintTo(file,"# gnuplot data -- maxpcset=",maxpcset," type=",type,"\n");
-#file := Concatenation(type,"-",String(maxdenom));
-#PrintTo(file,"# gnuplot data -- maxdenom=",mindenom," maxdenom=",maxdenom," mindist=",mindist," type=",type,"\n");
-lastinfinity := true;
-for i in [1..Length(points)] do
-    if IsInt(points[i][2]) then
-	real := infinity;
-	imag := infinity;
-	lastinfinity := true;
-    else
-	if not lastinfinity and AbsoluteValue(points[i-1][2]-points[i][2])>10*mindist then
-	    AppendTo(file,"infinity\t0\n"); # a jump in gnuplot
-	fi;
-	real := RealPart(points[i][2]);
-	imag := ImaginaryPart(points[i][2]);
-	lastinfinity := false;
-    fi;
-    AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(6,MacFloat(points[i][1])),"\n");
-od;
-# hubbard.g . . . . . . . . . . . . . . . . . . . . . . . . . ends here
-# recover angles:
-# awk '$1=="master" {n=substr($3,1,length($3)-1); angle[n]=$4; split($4,a,"/"); if(length(a)==1)a[2]=1; angleval[n]=1.0*a[1]/a[2]} $3=="master:" {if(NF==7){printf "%.10g\t%.10g\t%s\t%g\n",substr($5,1,length($5)-1)/10000000000.0,$6/10000000000.0,angle[$1],angleval[$1]}else{print "infinity\tinfinity\t" angle[$1] "\t" angleval[$1]}}' < log.
-# awk '{split($3,a,"/");if(a[2]==0)a[2]=1;b=a[1]*16384/a[2];seen[b]++} END{for(i=1;i<=11702;i++) if(seen[i]!=1) print i ",";for(i=14043;i<=16384;i++) if(seen[i]!=1) print i ","}' < rabbit-temp >
-
-if false then
-
-MakeReadWriteGlobal("ErrorInner");
-ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-
-hard := [8199, 8850, 9349, 9457, 9785, 9800, 10508, 10628, 10822,
-  11279, 11308, 11573, 11618, 11690, 14082, 14139, 14211, 14383,
-  14457, 14685, 14779, 15085, 15700];
-
-points := [];
-
-for angle in angles2 do
-  v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[1/7]))]:param_v:=3);
-  Info(InfoFR,1,"Angle ",angle,": spider converged to ",v);
-  Add(points,[angle,v]);
-od;
-
-file := "xx";
-PrintTo(file,"");
-for i in [1..Length(points)] do
-real := STRING_DIGITS_MACFLOAT(10,RealPart(points[i][2]));
-imag := STRING_DIGITS_MACFLOAT(10,ImaginaryPart(points[i][2]));
-AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(6,MacFloat(points[i][1])),"\n");
-od;
-
-# plot [300:1200] [200:700] '< convert -negate -modulate 200 ~/math/GAP/fr/sandbox/v3.jpg avs:-' binary filetype=avs with rgbimage, '~/math/GAP/fr/sandbox/airplane-4096' using (-($1+7.15)*40+700):(-$2*160+450) with lines
-fi;
-a2c(x,y) = 2*(x+{0,1}*y)/(x+{0,1}*y+1)
-
-plot [-0.7:3.75] [-1.98:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'airplane-13'  using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'rabbit-11-16384'  using (real(a2c($1,-$2))):(imag(a2c($1,-$2))) with lines
-set term pdfcairo size 29.7cm,21cm
-set out "wittner.pdf"
-replot
-set term png size 1112,990
-set out "wittner.png"
-replot
-plot [0.43:1.9] [0.5:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):($4 > 0.33333 && $4 < 0.666666 ? imag(a2c($1,$2)):1/0):(150+($4-0.333333)*150*3) with lines linew 2.0 palette,'airplane-13'  using (real(a2c($1,$2))):($4 > 0.142857 && $4 < 0.285715 ? imag(a2c($1,$2)):1/0):(30+($4-0.142857)*120*7) with lines linew 2.0 palette
diff --git a/sandbox/hurwitz.kroeker/README b/sandbox/hurwitz.kroeker/README
deleted file mode 100644
index a581d62..0000000
--- a/sandbox/hurwitz.kroeker/README
+++ /dev/null
@@ -1,18 +0,0 @@
-
-
-Hurwitz package for algorithmic construction of Hurwitz map approximations.
-
-
-Usage: see examples in 'example- folder
-
-	
-TODO: 
-	
-	-finish documentation
-	-finish cleanup
-	
-
-
-
-Authors:
- Jakob Kroeker and Laurent Bartholdi
diff --git a/sandbox/hurwitz.kroeker/deprecated/EXAMPLE b/sandbox/hurwitz.kroeker/deprecated/EXAMPLE
deleted file mode 100644
index 3e5a78d..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/EXAMPLE
+++ /dev/null
@@ -1,73 +0,0 @@
-
-
-################ functional-style nonverbose example:
-
-	LoadPackage("fr");
-	ReadPackage("fr","hurwitz/rationalMapFinder.gap");
-	finiteFieldSolutionList := rationalMapFinder@FR.SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD( [ [1,2], [2,1], [2,1], [2,1] ], false, [ [0/1, -1/2] ] , 13 );
-	liftedSolution := rationalMapFinder@FR.APPROX_HURWITZ_MAP_CANDIDATES( finiteFieldSolutionList[1] , Immutable(rec ( decimalPrecision := 16, maxLiftDepth  := 10, maxLatticeDim := 100)) );
-	rationalMapFinder@FR.CREATE_PRE_RATIONAL_MAP( liftedSolution.rootData[1], liftedSolution.liftedPolynomialRing );
-	
-
-############### object oriented style nonverbose example  #############################
-
-	LoadPackage("fr");
-	ReadPackage("fr","hurwitz/rationalMapFinder.gap");
-	M2binaryFileName := Filename( DirectoriesSystemPrograms() , "M2");	
-	HurwitzMapFinder := rationalMapFinder@FR.createMacaulay2HurwitzMapFinder( M2binaryFileName );	
-	finiteFieldSolutionList := HurwitzMapFinder.computeFiniteFieldSolutionsFI( [ [1,2], [2,1], [2,1], [2,1] ], false, [ [0/1, -1/2] ] , 13 );
-	liftedSolution := HurwitzMapFinder.approximateComplexSolutions( finiteFieldSolutionList[1] , Immutable(rec ( decimalPrecision := 16, maxLiftDepth  := 10, maxLatticeDim := 100))  );
-	preRationalMapList := rationalMapFinder@FR.preRationalMapFromRootDataElem( liftedSolution.rootData[1], liftedSolution.liftedPolynomialRing);	
-
-
-############### same example more explanatory #############################
-
-#### 0. init  
-
-	LoadPackage("fr");
-	ReadPackage("fr","hurwitz/rationalMapFinder.gap");
-	
-	SetInfoLevel(InfoWarning,2);
-	
-	RecNames(hurwitz);
-	
-	M2BinaryName := "M2";
-	BinarySearchDirectoryList  := DirectoriesSystemPrograms() ;		
-	#BinarySearchDirectoryList := [ Directory("/usr/local/bin/") ];
-
-	M2BinaryAbsoluteFileName := Filename( BinarySearchDirectoryList, M2BinaryName);
-	# create an object with the interface 'computeFiniteFieldSolutions(..)' and 'approximateComplexSolutions(..)':	
-	HurwitzMapFinder := rationalMapFinder@FR.createMacaulay2HurwitzMapFinder( M2BinaryAbsoluteFileName );	
-	 
-	
-#### 1. Brute force search for polynomialSets ([A,B,C,D],...) over given finite field Fp where 
-	##             polynomials A,B C and D matches given shapes, and for all pairs from [A,B,C,D]  gcd  is one ,
-	##	      B - lambda*A = C for some lambda in Fp and
-	##	      B - mue*A    = D with mue = -i*lambda  ( -i is determinated via 'branchValueApproxList'-parameter:
-	##                                                  branchValueApproxList[1][1] := RealPart(-i), branchValueApproxList[1][2] := ImaginaryPart[-i] ).
- 	## 						    First three branch values are omitted and assumed as normalized to [infinity, 0, 1 ]. 
-	
-	fieldChar := 13;	
-	partitionList := [ [1,2], [2,1], [2,1], [2,1] ]; 
-	branchValueApproxList := [ [0/1, -1/2] ];     # first three branch values ommitted and are assumed [infinity, 0, 1 ].
-	strictNormalization   := false; # if false, the algorithm decides, which factors will be normalized to [infinity, 0, 1 ],
-				       # otherwise first entries of the first three partitions in 'partitionList' determine which factors to normalize.
-	finiteFieldSolutionList := HurwitzMapFinder.computeFiniteFieldSolutionsFI( partitionList, strictNormalization, branchValueApproxList, fieldChar );
-	
-#### 2. Try to compute for a result from step (1) a lift to a polynomial ring over extension of Q and a complex approximation 
-	
-	finiteFieldSolution :=  finiteFieldSolutionList[1];
-		
-	liftOptions := rec ( decimalPrecision := 16 );
-	# following parameters are optional, but for default 'maxLiftDepth' and 'maxLatticeDim' the computation may run forever and/or consume all memory.
-	liftOptions.maxLiftDepth  := 10;  # lift up to    mod fieldChar^(2^maxLiftDepth) ; 
-	liftOptions.maxLatticeDim := 100; 
-		
-	liftedSolution := HurwitzMapFinder.approximateComplexSolutions( finiteFieldSolution, liftOptions );
-	
-	# liftedPolTuple.rootData containts a list  with the preimages of (infty, zero and 1) respectively
-        # the last element of 'rootData' contains the scaling factors [lambda,mue,...] : A-lambda*B=C;  A-mue*B=D; ..
-	
-	preRationalMapList := rationalMapFinder@FR.preRationalMapFromRootDataElem( liftedSolution.rootData[1], liftedSolution.liftedPolynomialRing);	
-	
-	
diff --git a/sandbox/hurwitz.kroeker/deprecated/FunctionalStyleInterface.gap b/sandbox/hurwitz.kroeker/deprecated/FunctionalStyleInterface.gap
deleted file mode 100644
index 37f05b2..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/FunctionalStyleInterface.gap
+++ /dev/null
@@ -1,123 +0,0 @@
-# This interface is explicitly not thread-safe by design!!
-# please use the object-oriented one.
-
-
-
-rationalMapFinder@.SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD   := NewOperation("SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD",[ IsList, IsBool, IsObject, IsPosInt] );
-
-
-#############################################################################
-##
-#F SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD( partitionList, strictNormalization, branchValueApproxList, fieldChar )
-##
-## <#GAPDoc Label="SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD">
-## <ManSection>
-##   <Func Name="SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD" Arg=" partitionList, strictNormalization, branchValueApproxList, fieldChar "/>
-##   <Returns>A list of polynomialTuples over the finite field ZZ/fieldchar which satisfies the request</Returns>
-##   <Description>
-##     This function searches for polynomial sets over finite field ZZ/<C>fieldChar</C>satisfying multiplicity structure given by <C>partitionList</C>,
-##	The number of polynomials of each set is equal to Length(<C>partitionList</C>)
-## 	and the polynomials will satisfy the equations
-##	polSet[1]-scaling[i]*polSet[2]=polSet[2+i]; i in 1..Length(partitionList)-2
-##	
-##
-##     <P/>  The algorithm normalizes three factors in each polynomial set to [inf,0 1] respectively 
-##	     If the parameter <C> strictNormalization</C> is true, 
-##		then the algorithm tries to normalize a factor with multiplicity=partitionList[1][1] of first polynomial  in polynomial set to infinity ,
-##		a factor with multiplicity=partitionList[2][1] of second polynomial  to zero  
-##		and  factor with multiplicity=partitionList[3][1] of third polynomial to one
-##		This is not always possible and thus less solutions will be found.
-##
-##     <P/>  To find corresponding compex approximations of the 
-##
-##
-##     <P/> The following example ...
-##
-## <Example><![CDATA[
-## gap> LoadPackage("fr");
-## gap>	ReadPackage("fr","hurwitz/rationalMapFinder.gap");
-## gap> finiteFieldSolutionList := rationalMapFinder@FR.SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD( [ [1,2], [2,1], [2,1], [2,1] ], false, [ [0/1, -1/2] ] , 13 );
-## gap> finiteFieldSolutionList;
-##[ rec( polynomialRing := GF(13)[t,s], polynomialTuple := [ t*s^2+Z(13)^9*s^3, t^3+Z(13)*t^2*s, t^3+Z(13)*t^2*s+Z(13)^5*t*s^2+Z(13)^2*s^3, t^3+Z(13)*t^2*s+Z(13)^7*t*s^2+Z(13^4*s^3 ], 
-##      polynomialTupleZZLift := [ t*s^2+5*s^3, t^3+2*t^2*s, t^3+2*t^2*s+6*t*s^2+4*s^3, t^3+2*t^2*s-2*t*s^2+3*s^3 ], rfsProblem := rec( scalingRelationList := [ [ 0, -1/2 ] ], ##shapeList := [ [ 2, 1 ], [ 2, 1 ], [ 2, 1 ], [ 2, 1 ] ] ) ), 
-##  rec( polynomialRing := GF(13)[t,s], polynomialTuple := [ t*s^2+Z(13)^4*s^3, t^3+Z(13)^2*t^2*s, t^3+Z(13)^2*t^2*s+Z(13)*t*s^2+Z(13)^5*s^3, t^3+Z(13)^2*t^2*s+Z(13)^9*t*s^2+Z(13*s^3 ], 
-##      polynomialTupleZZLift := [ t*s^2+3*s^3, t^3+4*t^2*s, t^3+4*t^2*s+2*t*s^2+6*s^3, t^3+4*t^2*s+5*t*s^2+2*s^3 ], rfsProblem := rec( scalingRelationList := [ [ 0, -1/2 ] ], shapeList := [ [ 2, 1 ], [ 2, 1 ], [ 2, 1 ], [ 2, 1 ] ] ) ), 
-##  rec( polynomialRing := GF(13)[t,s], polynomialTuple := [ t*s^2+Z(13)^4*s^3, t^3+Z(13)^2*t^2*s, t^3+Z(13)^2*t^2*s+Z(13)*t*s^2+Z(13)^5*s^3, t^3+Z(13)^2*t^2*s+Z(13)^9*t*s^2+Z(13)*s^3 ], 
- ##     polynomialTupleZZLift := [ t*s^2+3*s^3, t^3+4*t^2*s, t^3+4*t^2*s+2*t*s^2+6*s^3, t^3+4*t^2*s+5*t*s^2+2*s^3 ], rfsProblem := rec( scalingRelationList := [ [ 0, -1/2 ] ], shapeList := [ [ 2, 1 ], [ 2, 1 ], [ 2, 1 ], [ 2, 1 ] ] ) ), 
-##  rec( polynomialRing := GF(13)[t,s], polynomialTuple := [ t*s^2+Z(13)^4*s^3, t^3+Z(13)^2*t^2*s, t^3+Z(13)^2*t^2*s+Z(13)*t*s^2+Z(13)^5*s^3, t^3+Z(13)^2*t^2*s+Z(13)^9*t*s^2+Z(13)*s^3 ], 
-##      polynomialTupleZZLift := [ t*s^2+3*s^3, t^3+4*t^2*s, t^3+4*t^2*s+2*t*s^2+6*s^3, t^3+4*t^2*s+5*t*s^2+2*s^3 ], rfsProblem := rec( scalingRelationList := [ [ 0, -1/2 ] ], shapeList := [ [ 2, 1 ], [ 2, 1 ], [ 2, 1 ], [ 2, 1 ] ] ) ) ]
-## ]]></Example>
-##   </Description>
-## </ManSection>
-## <#/GAPDoc>
-##
-
-#if not IsBoundGlobal ("HurwitzMapFinder@FR") then
-#HurwitzMapFinder@FR:=fail;
-#fi;
- 
-
-InstallMethod(
-rationalMapFinder@.SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD,
-	"search for Hurwitz map candidates over a finite field. The solutions has to be lifted and approximated, see APPROX_HURWITZ_MAP_CANDIDATES",
-	[ IsList, IsBool, IsObject, IsPosInt ],
-	function( partitionList, strictNormalization, branchValueApproxList, fieldChar )
-		if (HurwitzMapFinder@FR=fail) then
-			Unbind(HurwitzMapFinder@FR);
-		fi;
-		if not IsBoundGlobal ("HurwitzMapFinder@FR") then
-			BindGlobal("HurwitzMapFinder@FR", rationalMapFinder@.createMacaulay2HurwitzMapFinder( M2EXEC@ ) );
-		fi;
-		return HurwitzMapFinder@FR.computeFiniteFieldSolutionsFI( partitionList, strictNormalization, branchValueApproxList, fieldChar );
-	end
-);
-
-
-#############################################################################
-##
-#F SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD( partitionList, strictNormalization, branchValueApproxList, fieldChar )
-##
-## <#GAPDoc Label="APPROX_HURWITZ_MAP_CANDIDATES">
-## <ManSection>
-##   <Func Name="APPROX_HURWITZ_MAP_CANDIDATES" Arg=" finiteFieldSolution, liftOptions "/>
-##   <Returns>A data structure from which it is possible to construct approximations of rational maps which are lifts 
-##		of the input from a finite field Hurwitz map candidate search </Returns>
-##   <Description>
-##     This function lifts a result from finite field Hurwitz map candidate search (see  <Ref Label="SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD" >) 
-##     to an extension field of rational numbers and approximates the map over complex numbers.
-##	One finite field search result is lifted to a set of rational maps which are represented by root data:
-##	 liftedPolTuple<C>.rootData</C> is a list where each element represents an Huritz map candidate.
-##	 A Hurwitz map representation is given by a list with the preimages of the branch values of the map and a scaling factor list.
-##	  The first three preimage lists consists of the preimages of (infinity, zero and 1) respectively.
-##        Each preimage list consists if pairs of a branch value preimage and its multiplicity.       
-##	  The polynomial W_1 is the polynomial with roots as preimages of infinity and W_2 the polynomial with roots as preimages of zero.
-##        (_link to preprint_)
-##	  The polynomials W_i are constructed via W_2 - scalingFactor[i-2]*W1 for i>2.
-##	<P/>
-##
-##   </Description>
-## </ManSection>
-## <#/GAPDoc>
-rationalMapFinder@.APPROX_HURWITZ_MAP_CANDIDATES   := NewOperation("APPROX_HURWITZ_MAP_CANDIDATES", [IsRecord, IsRecord] );
-
-InstallMethod(
-       rationalMapFinder@.APPROX_HURWITZ_MAP_CANDIDATES,
-       "approximate Hurwitz map candidates from data obtained by a finite field search (SEARCH_HURWITZ_MAP_OVER_FINITE_FIELD) ", 
-       [IsRecord, IsRecord],
-	function(  finiteFieldSolution, liftOptions )
-		#if (HurwitzMapFinder@FR=fail) then
-		#	Unbind(HurwitzMapFinder@FR);
-		#fi;
-		if not IsBoundGlobal ("HurwitzMapFinder@FR") then
-			BindGlobal("HurwitzMapFinder@FR", rationalMapFinder@.createMacaulay2HurwitzMapFinder( M2EXEC@ ) );
-		fi;
-		return HurwitzMapFinder@FR.approximateComplexSolutions( finiteFieldSolution, liftOptions );
-	end
-);
-
-# todo : 
-# todo : implement a black box rational map where the nominator and denominator are not expanded but represented by products of factors
-# this would probably increase precision. 
-
-rationalMapFinder@.CREATE_PRE_RATIONAL_MAP := rationalMapFinder@FR.preRationalMapFromRootDataElem;
-
diff --git a/sandbox/hurwitz.kroeker/deprecated/MacaulayMapFinderWrapper.gap b/sandbox/hurwitz.kroeker/deprecated/MacaulayMapFinderWrapper.gap
deleted file mode 100644
index 2942454..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/MacaulayMapFinderWrapper.gap
+++ /dev/null
@@ -1,448 +0,0 @@
-
-#####################################################################################################################
-
-
-## todo: newOperation nur fuer die Schnittstellen, nicht fuer private Funktionen...
-
-checkMacaulayPresence@ := function( M2Command )
-	Assert(0, IsString( M2Command ) or IsBool( M2Command ) );
-  	if M2Command=fail then 
-  		Error ("could not find Macaulay2 binary. Please install Macaulay2 on your system and/or setup the environment appropriately to use the 'rationalFunctionSearch' package");
-  	else
-  		Info( InfoWarning, 1,"M2 was found!");
-	fi;
-end;
-
-
-#rationalMapFinder@.checkMacaulayPresence := checkMacaulayPresence@;
-rationalMapFinder@.checkMacaulayPresence := NewOperation("checkMacaulayPresence",[IsObject]);
-InstallMethod( rationalMapFinder@.checkMacaulayPresence , "checkMacaulayPresence test", 	[IsObject], checkMacaulayPresence@);
-Unbind( checkMacaulayPresence@ );
-	
-
-checkMacaulayRFSPackagePresence@ := function(  M2Command   )
-	local M2InputStringStream, tmpdir, str, outStrStream, strerror, strSuccess, commandString;
-	Assert(0, IsString( M2Command ) or IsBool( M2Command ) );
-	#rationalMapFinder@.checkMacaulayPresence( M2Command ); 
- 	 
-	commandString :=        "try (loadPackage(\"rationalFunctionSearch\")\n ) then (print (\"loadsuc\" | \"cess\"))"; 
-	Append (commandString, "else (print (\"loader\" | \"ror\") ); ");
- 	M2InputStringStream := InputTextString(commandString);
-
- 	tmpdir := DirectoryTemporary();;
- 	str := "";; 
- 	outStrStream := OutputTextString( str, false );;
-
-	Process( tmpdir, M2Command, M2InputStringStream , outStrStream, [ "--no-prompts"  ] );;
-	strerror := ReplacedString(str,"loaderror","");
-	strSuccess := ReplacedString(str,"loadsuccess","");
-	if ( Size(strerror)<Size(str) ) then 
-		Error(" Macaulay2: load Macaulay2 package 'rationalFunctionSearch' failed. Please install the package.");
-		# Check if you are in the directory of the package or the Macaulay2 environment is set (correct path in '~/.Macaulay2/init.m2' 
-	else
-		if (Size(strSuccess)<Size(str)) then 
-			Info( InfoWarning, 1,"Macaulay2 package 'rationalFunctionSearch' available!\n");
-		else
-			Error("checkMacaulayRFSPackagePresence failed...");
-		fi;
-	fi;
-end;
-
-#rationalMapFinder@.checkMacaulayRFSPackagePresence := checkMacaulayRFSPackagePresence@;
-rationalMapFinder@.checkMacaulayRFSPackagePresence := NewOperation( "checkMacaulayRFSPackagePresence", [IsObject] );
-InstallMethod( rationalMapFinder@.checkMacaulayRFSPackagePresence , "checkMacaulayRFSPackagePresence test",
-		[IsObject], checkMacaulayRFSPackagePresence@);
-Unbind( checkMacaulayRFSPackagePresence@ );
-
-
-
-createM2RFSSearchString@ := 	function  ( rfsProblem, searchOptions, resultDestFileName)
-	local   commandString, key;
-	
-	Assert(0, rationalMapFinder@.IsRFSProblem(rfsProblem) );
-	Assert(0, rationalMapFinder@.IsRFSOptionList(searchOptions) );
-			
-	commandString:= ""; 
-	#str := OutputTextString( commandString, true );
-	Append (commandString, "loadPackage(\"rationalFunctionSearch\")\n");
-	Append (commandString, "shapeArray:= ");
-	Append (commandString,String(rfsProblem.shapeList));
-	Append (commandString, "\n");
-	Append (commandString,"shapeList:= new RFSShapeList from (apply(shapeArray,el->new Shape from el))\n");
-
-	Append (commandString, "scalingArray:= ");
-	Append (commandString,String(rfsProblem.scalingRelationList));
-	Append (commandString, "\n");
-	Append (commandString,"scalingRelationList:= new List from  (apply(scalingArray,el->new List from el))\n");
-	# todo: ohne if then else auskomen...?
-	if Size(rfsProblem.scalingRelationList)>0 then 
-		Append (commandString, "scalingRelationObj := createScalingRelations( scalingRelationList,true  );\n");
-	else
-		Append (commandString, "scalingRelationObj := createScalingRelations( null );\n");
-	fi;
-
-	if (IsBound(rfsProblem.normalizedFactorDegrees)) then 
-		Append (commandString, "strictNormRuleSet := createStrictNormalizationRuleSet(    ");
-		Append( commandString,String(rfsProblem.normalizedFactorDegrees ) );
-		Append (commandString, ");\n");
-		Append (commandString, "rfsProblem := createRFSProblem( shapeList, strictNormRuleSet, scalingRelationObj  );\n");
-	else
-		Append (commandString, "rfsProblem := createRFSProblem( shapeList, scalingRelationObj  );\n");
-	
-	fi;
-	Append (commandString," constructOptions := createPolynomialConstructOptions(null \n");
-	for key in RecNames(searchOptions) do 
-		if not rationalMapFinder@.IsNull(searchOptions.(key)) then 
-			Append (commandString,",\n \"");
-		 
-			Append(commandString,String(key));
-			Append (commandString,"\" => ");
-			 
-			Append(commandString,String(searchOptions.(key)));
-			Append (commandString," \n ");
-		fi;
-	
-	od;
-	Append (commandString,")\n");
-	Append (commandString,"sortedPolSetList := findFiniteFieldRFSExamples(rfsProblem, constructOptions );\n");
-	Append(commandString,"saveFFRFSResultInGAPfile(rfsProblem,constructOptions, sortedPolSetList, ");
-	Append(commandString,"\"");
-	Append(commandString, resultDestFileName );
-	Append(commandString,"\" ");
-	Append(commandString,");\n");
-	return commandString;
-end;
-	
-#rationalMapFinder@.createM2RFSSearchString := createM2RFSSearchString@;
-rationalMapFinder@.createM2RFSSearchString := NewOperation( "createM2RFSSearchString", [ IsRecord, IsRecord, IsString ] );
-InstallMethod( rationalMapFinder@.createM2RFSSearchString , "createM2RFSSearchString ",	[ IsRecord, IsRecord, IsString ], createM2RFSSearchString@);
-Unbind( createM2RFSSearchString@ );
-	
-
-performM2RFSSearchOverFiniteFields@ :=	function ( M2HurwitzMapFinder, rfsProblem, searchOptions )
-	local  runDir,  commandString, outStr, outStrStream,  output, outputFileName, inputStream, rfsObj, searchOutputOptions;
-
-
-	searchOutputOptions := M2HurwitzMapFinder.getSearchOutputOptions();
-	commandString :=  M2HurwitzMapFinder.private.createM2RFSSearchString( rfsProblem, searchOptions, searchOutputOptions.resultFileName );
-     
-	runDir:= searchOutputOptions.outputDirectory;
- 	outStr := ""; outStrStream := OutputTextString(outStr,false);;
- 	 
-	Info( InfoWarning, 2, commandString); 
- 	
- 	outputFileName := Concatenation( searchOutputOptions.resultFileName, ".M2input" );
- 	output := OutputTextFile( outputFileName , true );;
- 	WriteAll( output, commandString );
- 		 
-	Info( InfoWarning, 2,commandString);
-	CloseStream(output);
-	
- 	#inputStream := InputTextFile(outputFileName);
- 	inputStream := InputTextString( "" );
- 	Process(runDir, M2HurwitzMapFinder.getM2Command(), inputStream , outStrStream, [  String(outputFileName), "--no-prompts"  ] );;
-	rfsObj := ReadAsFunction( searchOutputOptions.resultFileName )(); 	#sets variable $resultVariableName  (here "rfsObj") !  
-	if (not M2HurwitzMapFinder.debug) then 
-		RemoveFile(outputFileName);
-		RemoveFile( searchOutputOptions.resultFileName );
-	fi;
-	
-	return rfsObj;
-end;
-
-#rationalMapFinder@.performM2RFSSearchOverFiniteFields := performM2RFSSearchOverFiniteFields@;
-rationalMapFinder@.performM2RFSSearchOverFiniteFields := NewOperation( "performM2RFSSearchOverFiniteFields", [ IsRecord, IsRecord, IsRecord ] );
-InstallMethod( rationalMapFinder@.performM2RFSSearchOverFiniteFields , "performM2RFSSearchOverFiniteFields ",
-					[ IsRecord, IsRecord, IsRecord ], performM2RFSSearchOverFiniteFields@);
-Unbind( performM2RFSSearchOverFiniteFields@  );
-
-
-createM2PolSetLiftCommandString@ := function( polSet, liftOptions, resultFileName)
-	local rfsProblem, commandString, key, ind ;
-	
-	commandString:= ""; 
-	rfsProblem := polSet.rfsProblem;
-
-	#str := OutputTextString(commandString,true);
-	Append (commandString, "loadPackage(\"padicLift\")\n");
-	Append (commandString, "loadPackage(\"rationalFunctionSearch\")\n");
-	Append (commandString, "shapeArray:= ");
-	Append(commandString,String(rfsProblem.shapeList));
-	Append (commandString, "\n");
-	Append (commandString,"shapeList:= new RFSShapeList from (apply(shapeArray,el->new Shape from el))\n");
-
-	Append (commandString, "scalingArray:= ");
-	Append (commandString,String(rfsProblem.scalingRelationList));
-	Append (commandString, "\n");
-	Append (commandString,"scalingRelationList:= new List from  (apply(scalingArray,el->new List from el))\n");
-	# todo: ohne if then else auskomen...?
-	if Size(rfsProblem.scalingRelationList)>0 then 
-		Append (commandString, "scalingRelationObj := createScalingRelations( scalingRelationList,true  );\n");
-	else
-		Append (commandString, "scalingRelationObj := createScalingRelations( null );\n");
-	fi;
-	#todo: get rid if duplicate code...
-	if ( IsBound(rfsProblem.normalizedFactorDegrees) ) then 
-		Append (commandString, "strictNormRuleSet := createStrictNormalizationRuleSet(    ");
-		Append ( commandString,String(rfsProblem.normalizedFactorDegrees ) );
-		Append (commandString, ");\n");
-		Append (commandString, "rfsProblem := createRFSProblem( shapeList, strictNormRuleSet, scalingRelationObj  );\n");
-	else
-		Append (commandString, "rfsProblem := createRFSProblem( shapeList, scalingRelationObj  );\n");
-	
-	fi;
-
-	Append (commandString, "  rng:=createRFSRing( ");
-		Append(commandString, String(Characteristic(polSet.polynomialRing)) );
-	Append (commandString, "  ); \n");
-	ind := IndeterminatesOfPolynomialRing(polSet.polynomialRing);
-	Assert(0, Size(ind)=2 );
-	Append( commandString, String(ind[1]) );
-	Append (commandString, ":=  commonVariable rng; \n");
-	Append( commandString, String(ind[2]) );
-	Append (commandString, ":= homogenVariable rng; \n");
-	#todo: check in Macaulay if polynomials are homogenized. (when creating createRFSPolSet)
-
-	Append (commandString, "polArray := ");
-	Append (commandString, String(polSet.polynomialTupleZZLift));
-	Append (commandString, "; \n ");
-
-	Append (commandString, "polSet := createRFSPolynomialSet( rfsProblem, polArray);\n ");
-
-	Append (commandString," liftOptions := createLiftOptions(null ");
-	for key in RecNames(liftOptions) do 
-		if not rationalMapFinder@.IsNull(liftOptions.(key)) then 
-			Append (commandString,",\n \"");
-			Append(commandString,String(key));
-			Append (commandString,"\" => ");
-			Append(commandString,String(liftOptions.(key)));
-			Append (commandString,"  ");
-		fi;
-	
-	od;
-	Append (commandString," );\n");
-
-	Append (commandString,"  tryLiftAndLLLAndPairPolSet( polSet, \"liftAndLLLOptions\"=>liftOptions ); \n");
-	     Append(commandString,"saveRFSLiftResultInGAPfile(polSet,liftOptions, ");
-	Append(commandString,"\"");
-	Append( commandString, String(resultFileName) );
-	Append(commandString,"\"");
-	Append(commandString,");\n");	
-	commandString:=ReplacedString(commandString,"\\",""); # hab schon vergessen, wozu diese Ersetzung notwendig ist.
-	return   commandString;	
-end;
-
-#rationalMapFinder@.createM2PolSetLiftCommandString := createM2PolSetLiftCommandString@;
-rationalMapFinder@.createM2PolSetLiftCommandString := NewOperation( "createM2PolSetLiftCommandString", [ IsRecord, IsRecord, IsString ] );
-InstallMethod( rationalMapFinder@.createM2PolSetLiftCommandString , "createM2PolSetLiftCommandString ",
-		 [ IsRecord, IsRecord, IsString ], createM2PolSetLiftCommandString@);
-Unbind( createM2PolSetLiftCommandString@  );
-
-
-performM2RFSPolSetLift@ := function ( M2HurwitzMapFinder, polSet, liftOptions  )
-	local runDir, commandString,outStr, outStrStream, output, outputFileName, inputStream, liftedPolSet,liftOutputOptions ;
-
-	liftOutputOptions := M2HurwitzMapFinder.getLiftOutputOptions();
-
-	commandString := M2HurwitzMapFinder.private.createM2PolSetLiftCommandString(polSet, liftOptions, liftOutputOptions.resultFileName);
-	#Print(commandString); # -- debug
-	 
-	runDir:= liftOutputOptions.outputDirectory;
- 	outStr := ""; outStrStream := OutputTextString( outStr,false );; 	
- 	
- 	# reason for saving and loading: Macaulay has problems with "\ cr" in the InputTextString(commandString).
- 	# Writing the commandString to a file and then creating  the input stream via InputTextFile works.
- 	outputFileName := Concatenation( liftOutputOptions.resultFileName, ".M2input" );
- 	Print("outputFileName:");
- 	Print(outputFileName);Print("\n");
- 	output := OutputTextFile( outputFileName , true );;
- 	 
- 	WriteAll( output, commandString );
-	CloseStream(output);
- 	#inputStream := InputTextFile(outputFileName);
-	inputStream := InputTextString( "" );
- 
-	Info( InfoWarning, 2,commandString);
-	
- 	Process(runDir, M2HurwitzMapFinder.getM2Command(), inputStream , outStrStream, [ String(outputFileName), "--no-prompts"  ] );;
- 	
- 	if (not M2HurwitzMapFinder.debug) then 
-		RemoveFile(outputFileName);
-	fi;
-
- 	liftedPolSet := ReadAsFunction( liftOutputOptions.resultFileName)(); 	#sets variable $resultVariableName  (here "rfsObj") !  
- 	
- 	if (not M2HurwitzMapFinder.debug) then 
-		RemoveFile( liftOutputOptions.resultFileName);
-	fi;
-
-	return liftedPolSet;
-end;
-
-rationalMapFinder@.performM2RFSPolSetLift := performM2RFSPolSetLift@;	
-rationalMapFinder@.performM2RFSPolSetLift := NewOperation( "performM2RFSPolSetLift", [ IsRecord, IsRecord, IsRecord ] );
-InstallMethod( rationalMapFinder@.performM2RFSPolSetLift , "performM2RFSPolSetLift  ",
-		 [ IsRecord, IsRecord, IsRecord ],performM2RFSPolSetLift@);	
-Unbind( performM2RFSPolSetLift@  );
-
-###########################################################################
-
-
-performM2RFSSearchOverFiniteFieldsFI@ := function( M2HurwitzMapFinder, integerPartitionList, strictNormalization, scalingRelationList, finiteFieldChar )
-	
-	local key, shapeList, rfsProblem, searchOptions, rfsObj, polSetList;
-
-	Assert( 0, IsPrime( finiteFieldChar ) );
-	shapeList  := rationalMapFinder@.createShapeList( integerPartitionList );
-	rfsProblem := rec( shapeList:=shapeList ,  scalingRelationList := scalingRelationList);
-	if (strictNormalization) then 
-		Assert(0, Size(integerPartitionList)>2 );
-		rfsProblem.normalizedFactorDegrees := [ integerPartitionList[1][1], integerPartitionList[2][1], integerPartitionList[3][1] ];
-	fi;
-
-	searchOptions := rationalMapFinder@.createRFSOptionListByChar(finiteFieldChar);	
-	rationalMapFinder@.RFSOptionListCheckConsistency(searchOptions);		
-
-	rfsObj := M2HurwitzMapFinder.computeFiniteFieldSolutions( rfsProblem, searchOptions );
-
-	polSetList := [];
-	# put all example candidates in one list
-	for key in RecNames(rfsObj.polynomialSetTable) do
-		Append(polSetList,rfsObj.polynomialSetTable.(key) );
-	od;
-
-	return polSetList;
-end;
-
-rationalMapFinder@.performM2RFSSearchOverFiniteFieldsFI := performM2RFSSearchOverFiniteFieldsFI@;
-rationalMapFinder@.performM2RFSSearchOverFiniteFieldsFI := NewOperation( "performM2RFSSearchOverFiniteFieldsFI", [ IsRecord, IsList, IsBool, IsList, IsPosInt ] );
-InstallMethod( rationalMapFinder@.performM2RFSSearchOverFiniteFieldsFI , "performM2RFSSearchOverFiniteFieldsFI test",
-		 [ IsRecord, IsList, IsBool, IsList, IsPosInt ], performM2RFSSearchOverFiniteFieldsFI@);
-Unbind( performM2RFSSearchOverFiniteFieldsFI@  );
-
-
-findBinary@ := function (binaryName, searchPathList)
-	local  localSearchPathList;
-	localSearchPathList := searchPathList;
-	if rationalMapFinder@.IsNull( localSearchPathList ) then
-		 localSearchPathList :=  DirectoriesSystemPrograms();
-	fi;
-	return Filename( localSearchPathList, binaryName );
-end;
-
-rationalMapFinder@.findBinary := findBinary@;
-Unbind( findBinary@ );
-
-
-createMacaulay2HurwitzMapFinder@ := function ( M2BinaryFileName )
-	local M2HurwitzMapFinder,private   ;
-		
-	M2HurwitzMapFinder:= rec();
-	
-	
-	#################### private : ####################################
-	private := rec();
-	private.checkMacaulayPresence := rationalMapFinder@.checkMacaulayPresence;
-	#Unbind( rationalFunctionSearch.checkMacaulayPresence );
-	private.checkMacaulayRFSPackagePresence := rationalMapFinder@.checkMacaulayRFSPackagePresence;
-	#Unbind( rationalFunctionSearch.checkMacaulayRFSPackagePresence );
-	
-	private.createM2RFSSearchString := rationalMapFinder@.createM2RFSSearchString;
-	#Unbind( rationalFunctionSearch.createM2RFSSearchString );
-	
-	private.createM2PolSetLiftCommandString := rationalMapFinder@.createM2PolSetLiftCommandString;
-	#Unbind( rationalFunctionSearch.createM2PolSetLiftCommandStrin );
-	 
-		
-	private.performM2RFSSearchOverFiniteFieldsFI := rationalMapFinder@.performM2RFSSearchOverFiniteFieldsFI;
-	#Unbind( rationalFunctionSearch.performM2RFSSearchOverFiniteFieldsFI );
-	
-	private.performM2RFSSearchOverFiniteFields := rationalMapFinder@.performM2RFSSearchOverFiniteFields;
-	#Unbind( rationalFunctionSearch.performM2RFSSearchOverFiniteFields );
-	
-	private.performM2RFSPolSetLift := rationalMapFinder@.performM2RFSPolSetLift;
-	
-	M2HurwitzMapFinder.private := Immutable(private);
-	################### public #####################################	
-		
-	M2HurwitzMapFinder.computeFiniteFieldSolutionsFI := function( integerPartitionList, strictNormalization, scalingRelationList, finiteFieldChar  )
-	
-		return  M2HurwitzMapFinder.private.performM2RFSSearchOverFiniteFieldsFI( M2HurwitzMapFinder , 
-												 integerPartitionList,
-												 strictNormalization, 
-												 scalingRelationList, 
-												 finiteFieldChar);
-	end;
-	
-	
-	M2HurwitzMapFinder.computeFiniteFieldSolutions := function( rfsProblem, searchOptions  )
-		return  M2HurwitzMapFinder.private.performM2RFSSearchOverFiniteFields( M2HurwitzMapFinder ,  rfsProblem, searchOptions );
-	end;
-	
-
-	M2HurwitzMapFinder.approximateComplexSolutions			:= function(  polSet, liftOptions)
-		return M2HurwitzMapFinder.private.performM2RFSPolSetLift( M2HurwitzMapFinder,  polSet, liftOptions);
-	end;
-	 
-
-	M2HurwitzMapFinder.getM2Command := function () 
-		return M2BinaryFileName;
-	end;
-	
-	
-	M2HurwitzMapFinder.checkMacaulayPresence:= function() 
-		private.checkMacaulayPresence( M2HurwitzMapFinder.getM2Command() );
-	end;
-	
-	M2HurwitzMapFinder.checkMacaulayRFSPackagePresence :=   function() 
-		private.checkMacaulayRFSPackagePresence( M2HurwitzMapFinder.getM2Command() );
-	end;
-	
-	
-	
-	##########################################
-	M2HurwitzMapFinder.getSearchOutputOptions := function()
-		local searchOutputOptions,randInt;
-		searchOutputOptions := rec();
-		randInt:= Random(10000000,100000000000);
-		searchOutputOptions.resultFileName := Concatenation("RFSsearchResult",String(randInt),".gap");
-	
-		searchOutputOptions.resultVariableName := Concatenation("rfsObj",String(randInt)); 
-	
-		searchOutputOptions.outputDirectory := DirectoryTemporary();;
-	
-		searchOutputOptions.resultFileName := Filename( searchOutputOptions.outputDirectory , searchOutputOptions.resultFileName );
-		return Immutable(searchOutputOptions);
-	end;
-	##########################################
-	 
-	M2HurwitzMapFinder.getLiftOutputOptions := function()
-		local liftOutputOptions, randInt;
-		liftOutputOptions := rec();
-		randInt:= Random(10000000,100000000000);
-		liftOutputOptions.resultFileName := Concatenation("RFSLiftResult",String(randInt),".gap");
-	
-		liftOutputOptions.resultVariableName := Concatenation("liftedPolSet",String(randInt)); 
-		liftOutputOptions.outputDirectory := DirectoryTemporary();;	
-		liftOutputOptions.resultFileName := Filename( liftOutputOptions.outputDirectory , liftOutputOptions.resultFileName );
-		return Immutable(liftOutputOptions);
-	end;
-	##########################################
-	
-	########### checks#######################
-	M2HurwitzMapFinder.checkMacaulayPresence();
-	M2HurwitzMapFinder.checkMacaulayRFSPackagePresence();
-	
-	M2HurwitzMapFinder.debug := false;
-	
-	return Immutable(M2HurwitzMapFinder);
-end;
-
-rationalMapFinder@.createMacaulay2HurwitzMapFinder := createMacaulay2HurwitzMapFinder@ ;
-rationalMapFinder@.createMacaulay2HurwitzMapFinder := NewOperation("createMacaulay2HurwitzMapFinder" ,[IsString] );
-InstallMethod(rationalMapFinder@.createMacaulay2HurwitzMapFinder, " creates a HurwitzMap finder using Macaulay2 routines", [IsString],createMacaulay2HurwitzMapFinder@);
-
- 
-
-
-
diff --git a/sandbox/hurwitz.kroeker/deprecated/README b/sandbox/hurwitz.kroeker/deprecated/README
deleted file mode 100644
index 44b4ab1..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/README
+++ /dev/null
@@ -1,38 +0,0 @@
-
-
-Hurwitz package currently requires 
-	-subversion client installation
-	-Macaulay2 installation >=1.4
-	
-
-Usage: see EXAMPLE file.
-
-For debugging I recommend to
-- increase  the Infolevel : SetInfoLevel(InfoWarning,2);
-
-
-
-
-	
-TODO:
-	-check presence of required programs.
-	-connect routines to top-level of package "FR".
-	-sometimes when calling from GAP it seems that the memory of M2 is corrupted (log function of M2 gives wrong answers. very strange...). Debug!
-	
-		
-
-
--It is currently not possible to host the Macaulay2 packages in the CVS,
-because they are used at two places (in Macaulay2 and in GAP), 
-but linking an external CVS is not possible because even for read permission (?) a user and a password are required.
-
-It would help, if GAP will switch to mercurial or to SVN.
-
-
-
-
-
-
-
-
-
diff --git a/sandbox/hurwitz.kroeker/deprecated/notes b/sandbox/hurwitz.kroeker/deprecated/notes
deleted file mode 100644
index dae2b16..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/notes
+++ /dev/null
@@ -1,40 +0,0 @@
-# Fragen an Laurent: 
-# wo und wann muss "SetFloats(MPC);;" stattfinden?
-
-# Es gibt ein InfoFR-Objekt
-
-MakeReadWriteGlobal
-InstallValue
-NeedsOtherPackage
-DeclareGlobalFunction
-MakeReadWrite
-
-	
-#Notizen:	
-# -Wenn Funktionen nicht ReadOnly definiert werden, können diese Überschrieben werden und es ist nichts mehr korrekt.
-# -kein PrintTo verwenden! (Erzeugt automatisch Umbrüche a la "\<cr>").
-# bindGlobal bindet eine Methode 
-# Example for installing non-global Methods:
-#
-#  rationalMapFinder@.IsIntegerPartition := NewProperty("IsIntegerPartition",IsObject);
-#  InstallMethod(rationalMapFinder@.IsIntegerPartition,"IsIntegerPartition test",[IsObject],IsIntegerPartitionFkt);
-#  ...
-#  rationalMapFinder@ := Immutable(rationalMapFinder@);
-
-#DeclareGlobalFunction( "preRationalMapFromRootDataElem" );
-#InstallGlobalFunction(preRationalMapFromRootDataElem, preRationalMapFromRootDataElemFkt);
-
-# ob Objectify oder nur Rec: man kann immer mit "!." zugreifen! 
-# ausserdem kann man  ja auch eine Methode 'RecNames' installeren?
-
-
-getPackage("VectorFields",Repository=>"http://www.utsc.utoronto.ca/~bpike/software/");
-
-# AppendTo eventuell auch mist:
-
-http://mail.gap-system.org/pipermail/forum/2006/001407.html
-
-SetPrintFormattingStatus
-
-
-
diff --git a/sandbox/hurwitz.kroeker/deprecated/rationalMapFinder.gap b/sandbox/hurwitz.kroeker/deprecated/rationalMapFinder.gap
deleted file mode 100644
index f3d54ed..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/rationalMapFinder.gap
+++ /dev/null
@@ -1,578 +0,0 @@
-
-# "rationalMapFinder.gap" Hurwitz rational map finder.
-# Documentation: coming soon; see for starters the EXAMPLE file.
-
-# TODO: 
-#  -clean code (partly done)
-#  -documentation 
-
-
-LoadPackage ("guava"); #DivisorsMultivariatePolynomial, DegreeMultivariatePolynomial
-#DivisorsMultivariatePolynomial:  factor multivariate Polynomial!
-LoadPackage ("float"); #Root finding and complex numbers
-
-# TODO: where 'setFloats' should be called?
-SetFloats(MPC);;
-
-if not IsBound(Null) then
-	BindGlobal("Null", MakeImmutable([]) );
-fi;
-
-rationalMapFinder@ := rec();
-
-rationalMapFinder@.IsConsistent := NewProperty("IsConsistent", IsObject );
-rationalMapFinder@.checkConsistency := NewOperation("checkConsistency", [IsObject] );
-
-
-##########################################################################################################################
-IsIntegerPartition@ := function(partition)
-	local shapeCopy,entry;
-	if not IsList(partition) then
-		return false;
-	fi;
-	if Size(partition)=0 then
-		return false;
-	fi;
-	for entry in partition do
-		if not IsInt(entry) or  entry<1 then 
-			return false;
-		fi;
-	od;
-	return true;
-end;
-
-rationalMapFinder@.IsIntegerPartition := IsIntegerPartition@;
-#rationalMapFinder@.IsIntegerPartition := NewProperty("IsIntegerPartition", IsList);
-#InstallMethod( rationalMapFinder@.IsIntegerPartition , "IsIntegerPartition test",[IsList], IsIntegerPartition@ );
-Unbind( IsIntegerPartition@ );
-
-# rationalMapFinder@.IsIntegerPartition := IsIntegerPartitionFilter; # dangerous, because IsIntegerPartitionFilter is not immutable.
-
-
-
-IsShape@ := function(shape)
-	local shapeCopy,entry;
-	if not rationalMapFinder@.IsIntegerPartition(shape) then
-		return false;
-	fi;
-	shapeCopy := ShallowCopy(shape);
-	Sort(shapeCopy);
-	return (shape=Reversed(shapeCopy));
-end;
-
-rationalMapFinder@.IsShape := IsShape@;
-#rationalMapFinder@.IsShape := NewProperty("IsShape",IsObject);
-#InstallMethod( rationalMapFinder@.IsShape , "IsShape test",[IsObject], IsShape@ );
-Unbind( IsShape@ );
-
-
-# create a shape from a unsorted integer list.# Todo: allow only IntegerPartitions as parameter.
-createShape@ := function(list)
-	local shapeCopy,entry,preShape;
-	if not rationalMapFinder@.IsIntegerPartition(list) then
-		Error("parameter has to be a integer partition (a integer list with entries>1");
-	fi;
-	preShape :=ShallowCopy(list);
-	Sort(preShape);
-	return Reversed(preShape);
-end;
-
-
-rationalMapFinder@.createShape := createShape@;
-#rationalMapFinder@.createShape := NewOperation("createShape", [IsObject] );
-#InstallMethod( rationalMapFinder@.createShape , "createShape test",[IsObject], createShape@ );
-Unbind( createShape@ );
-
-##########################################################################################################################
-
-IsShapeList@ := function (shapeList  )
-	local entry,degree;
-	if not IsList(shapeList) then
-		Info( InfoWarning, 2, "parameter has to be a list" );
-		return false;
-	fi;
-	if Size(shapeList)>0 then
-	
-		for entry in shapeList do
-			if not rationalMapFinder@.IsShape(entry) then
-				Info( InfoWarning, 2,"Shape list entries  has to be shapes");
-				return false;
-			fi;
-		od;
-		degree := Sum(shapeList[1]);
-		for entry in shapeList do
-			if not Sum(entry)=degree then
-				Info( InfoWarning, 2,"IsShapeList: shapes expected to have same degree ");
-				return false;
-			fi;
-		od;
-	fi;
-	return true;	
-end;
-
-rationalMapFinder@.IsShapeList :=  IsShapeList@;
-#rationalMapFinder@.IsShapeList := NewProperty("IsShapeList", IsObject );
-#InstallMethod( rationalMapFinder@.IsShapeList , "IsShapeList filter",[IsObject], IsShapeList@ );
-Unbind( IsShapeList@ );
-
-
-createShapeList@ := function(list)
-	local shape,entry,shapeList;
-	shapeList:=[];
-	for entry in list do
-		shape := rationalMapFinder@.createShape(entry);
-		Append(shapeList,[shape]);
-	od;
-	Assert(0, rationalMapFinder@.IsShapeList(shapeList));
-	return shapeList;
-end;
-
-rationalMapFinder@.createShapeList := createShapeList@;
-#rationalMapFinder@.createShapeList := NewOperation("createShapeList", [IsList] );
-#InstallMethod( rationalMapFinder@.createShapeList , "createShapeList  ",[IsList],createShapeList@);
-Unbind( createShapeList@ );
-
-
-#########################################################################################################################
-IsScalingRelationList@ := function(scalingRelation)
-	local elem,defaultError,part;
-	if not IsList(scalingRelation) then 
-		 Info( InfoWarning, 2,"rfsProblem is not a record");
-		return false;
-	fi;
-
-	defaultError := "Error: scalingRelation entries must be pairs of real and imaginary complex number part ";	
-	for elem in scalingRelation do
-		if not  IsList(elem) then
-			Info( InfoWarning, 2,defaultError);		 
-			return false;
-		fi;
-
-		if not  Size(elem)=2 then
-				Info( InfoWarning, 2,defaultError);
-			return false;
-		fi;
-		for part in elem do	
-			if  not  part in Rationals then
-				Info( InfoWarning, 2,defaultError);	 
-				return false;
-			fi;
-		od;
-	od;
- 	return true;
-end;
-
-
-rationalMapFinder@.IsScalingRelationList :=  IsScalingRelationList@;
-#rationalMapFinder@.IsScalingRelationList := NewProperty("IsScalingRelationList", IsObject );
-#InstallMethod( rationalMapFinder@.IsScalingRelationList , "IsScalingRelationList  ",[IsObject], IsScalingRelationList@);
-Unbind( IsScalingRelationList@ );
-
-##################################################################################################################
-
-IsRFSProblem@ := function (rfsProblem)
-	local keyList,key,rnames ;
-	if not IsRecord(rfsProblem) then 
-		Info( InfoWarning, 2,"IsRFSProblemFkt: rfsProblem is not a record");
-		return false;
-	fi;
-	 keyList:=["shapeList","scalingRelationList"];
-	    rnames:=    RecNames(rfsProblem);
-	
-	    for key in 	keyList do 
-		if    Position(rnames,key)=false then
-			Info( InfoWarning, 2,"IsRFSProblemFkt: key shapeList or scalingRelations missing\n");
-		    	return false;
-		fi;
-	    od;
-	    if not Length(keyList)=Length(rnames) then 
-	    	return false;
-	    fi;
-	    if not rationalMapFinder@.IsShapeList(rfsProblem.shapeList) then
-	    	return false;
-	    fi;
-	    if not rationalMapFinder@.IsScalingRelationList(rfsProblem.scalingRelationList) then
-	    	return false;
-	    fi;
-	    if (Size(rfsProblem.scalingRelationList)+3 <> Size(rfsProblem.shapeList) ) then
-			Info( InfoWarning, 2,"IsRFSProblemFkt: to many or too less scaling relations.\n");
-	    	    	return false;
-	   fi;
-	   return true;
-	    
-end;
-
-rationalMapFinder@.IsRFSProblem := IsRFSProblem@;
-#rationalMapFinder@.IsRFSProblem := NewProperty("IsRFSProblem", IsObject );
-#InstallMethod( rationalMapFinder@.IsRFSProblem , "IsRFSProblem  ",[IsObject], IsRFSProblem@ );
-Unbind( IsRFSProblem@ );
-
-###########################################################################################################
-
-IsNull@ := function (object)
-	return (IsList(object) and IsEmpty(object));
-end;
-
-rationalMapFinder@.IsNull := IsNull@;
-#rationalMapFinder@.IsNull := NewProperty("IsNull", IsObject );
-#InstallMethod( rationalMapFinder@.IsNull , "IsNull  ",[IsObject], IsNull@ );
-Unbind( IsNull@ );
-
-
-IsIntOrNull@ := function(object)
-	return (rationalMapFinder@.IsNull(object) or IsInt(object));
-end;
-
-rationalMapFinder@.IsIntOrNull := IsIntOrNull@ ;
-#rationalMapFinder@.IsIntOrNull := NewProperty("IsIntOrNull", IsObject );
-#InstallMethod( rationalMapFinder@.IsIntOrNull , "IsIntOrNull  ",[IsObject],IsIntOrNull@);
-Unbind( IsIntOrNull@ );
-
-############################################################################################################
-
-IsRFSOptionList@ := function (rfsOptionList)
-	local keyList,key,rnames,errormsg ;
-	if not IsRecord(rfsOptionList) then 
-		Info( InfoWarning, 2,"rfsOptionList is not a record\n");
-		return false;
-	fi;
-	# keyList:=["minChar","maxChar","softExampleLimit","parallelize", "resultFileName"];
-	 keyList:=["minChar","maxChar","softExampleLimit","parallelize"];
-	    rnames:=    RecNames(rfsOptionList);
-	     for key in 	keyList do 
-		if    Position(rnames,key)=false or Position(rnames,key)=fail then
-			errormsg:= Concatenation("key " , key ," is missing \n");
-			Info( InfoWarning, 2,errormsg);
-		    	return false;
-		fi;
-	    od;
-    	#if not IsString(rfsOptionList.resultFileName) then 
-    	#	# todo: check if resultFileName can be created/deleted
-	#	Info( InfoWarning, 2,"rfsOptionList.resultFileName must be an string!\n");
-	#	return false;
-	#fi;
-	if not rationalMapFinder@.IsIntOrNull(rfsOptionList.minChar)   then 
-		Info( InfoWarning, 2,"rfsOptionList.minChar must be an int or Null!\n");
-		return false;
-	fi;
-	# TODO: eliminate dublicate code...
-	if not rationalMapFinder@.IsIntOrNull(rfsOptionList.maxChar)   then 
-		Info( InfoWarning, 2,"rfsOptionList.maxChar must be an int or Null!\n");
-		return false;
-	fi;
-	
-	if not rationalMapFinder@.IsIntOrNull(rfsOptionList.softExampleLimit)  then 
-		Info( InfoWarning, 2,"rfsOptionList.softExampleLimit must be an int!\n");
-		return false;
-	fi; 
-	
-
-	if not IsBool(rfsOptionList.parallelize) then 
-		Info( InfoWarning, 2,"rfsOptionList.parallelize must be a boolean!\n");
-		return false;
-	fi;
-	return true;
-end;
-
-rationalMapFinder@.IsRFSOptionList :=  IsRFSOptionList@;
-#rationalMapFinder@.IsRFSOptionList := NewProperty("IsRFSOptionList", IsObject );
-#InstallMethod( rationalMapFinder@.IsRFSOptionList , "IsRFSOptionList  ",[IsObject],IsRFSOptionList@);
-Unbind( IsRFSOptionList@ );
-
-
-RFSOptionListIsConsistent@ := function(rfsOptionList)
-	Assert(0,rationalMapFinder@.IsRFSOptionList(rfsOptionList));
-	if rationalMapFinder@.IsNull(rfsOptionList.minChar) then 
-		return false;
-	fi;
-	if not  rfsOptionList.minChar >1 then 
-		Info( InfoWarning, 2,"rfsOptionList.minChar must be >1!");
-		return false;
-	fi;	
-	if   not rationalMapFinder@.IsNull(rfsOptionList.maxChar)  then 
-		if   (rfsOptionList.maxChar-rfsOptionList.minChar) <0 then
-			Info( InfoWarning, 2,"rfsOptionList.maxChar < minChar");
-			return false;
-		fi;	
-	else    # maxChar is null
-		if rationalMapFinder@.IsNull(rfsOptionList.softExampleLimit) or not rfsOptionList.softExampleLimit>0 then 
-			Info( InfoWarning, 2,"in case rfsOptionList.maxChar<rfsOptionList.minChar condition rfsOptionList.softExampleLimit>0 required!");
-			return false;			
-		fi; 
-		
-	fi;
-	
-	if  not rationalMapFinder@.IsNull(rfsOptionList.softExampleLimit) then 
-		if (rfsOptionList.softExampleLimit<1) then 
-			Info( InfoWarning, 2,"softExampleLimit has to be >=1 or Null (=[]) !");
-			return false;
-		fi;
-	fi;
-	
-	return true;
-end;
-
-rationalMapFinder@.RFSOptionListIsConsistent := RFSOptionListIsConsistent@;
-#InstallMethod( rationalMapFinder@.IsConsistent , "IsConsistent   ",[rationalMapFinder@.IsRFSOptionList], RFSOptionListIsConsistent@);
-#rationalMapFinder@.RFSOptionListIsConsistent := NewOperation("RFSOptionListIsConsistent", [IsObject] );
-#InstallMethod( rationalMapFinder@.RFSOptionListIsConsistent , "RFSOptionListIsConsistent   ",[IsObject], RFSOptionListIsConsistent@);
-Unbind( RFSOptionListIsConsistent@ );
-
-
-RFSOptionListCheckConsistency@ := function(rfsOptionList)
-	Assert(0, rationalMapFinder@.RFSOptionListIsConsistent (rfsOptionList));
-end;
-
-rationalMapFinder@.RFSOptionListCheckConsistency := RFSOptionListCheckConsistency@;
-#rationalMapFinder@.RFSOptionListCheckConsistency := NewOperation("RFSOptionListCheckConsistency", [IsObject] );
-#InstallMethod( rationalMapFinder@.RFSOptionListCheckConsistency , "RFSOptionListCheckConsistency   ",[IsObject], RFSOptionListCheckConsistency@);
-
-Unbind( RFSOptionListCheckConsistency@ );
-
-
-createDefaultRFSOptionList@ := function()
-	local rfsOptionList;
-	rfsOptionList := rec (minChar:=2, maxChar:=[], softExampleLimit:=1,   parallelize:=false);
-	Assert(0,rationalMapFinder@.IsRFSOptionList(rfsOptionList));
-	return rfsOptionList;
-end;
-
-rationalMapFinder@.createDefaultRFSOptionList := createDefaultRFSOptionList@;
-#rationalMapFinder@.createDefaultRFSOptionList := NewOperation("createDefaultRFSOptionList", [] );
-#InstallMethod( rationalMapFinder@.createDefaultRFSOptionList , "createDefaultRFSOptionList   ",[], createDefaultRFSOptionList@);
-Unbind( createDefaultRFSOptionList@ );
-
-createRFSOptionListByCharFkt@ := function(characteristic)
-	local rfsOptionList;
-	Assert(0, rationalMapFinder@.IsPrime(characteristic));
-	rfsOptionList := rec (minChar:=characteristic, maxChar:=characteristic, softExampleLimit:=[],  parallelize:=false);
-	Assert(0, rationalMapFinder@.IsRFSOptionList(rfsOptionList));
-	return rfsOptionList;
-end;
-
-rationalMapFinder@.IsPrime := NewProperty("IsPrime", IsInt );
-
-InstallMethod( rationalMapFinder@.IsPrime, "IsPrime", [IsInt], 
-function(primecandidate)
-	 return IsPrime(primecandidate);
-end );
-
-rationalMapFinder@.createRFSOptionListByChar := NewOperation("createRFSOptionListByChar", [IsPosInt] );
-InstallMethod( rationalMapFinder@.createRFSOptionListByChar , "createRFSOptionListByChar   ",[IsPosInt],createRFSOptionListByCharFkt@);
-Unbind( createRFSOptionListByCharFkt@ );
-
-##################################################################################################################################
-
-
-
-IsRFSPolynomialSetFkt@ := function(polSet)
-    local indeterminates, rng, rnames, key, keyList, pol,smallDegreeCount;
-    if not  IsRecord(polSet) then
-       return false;
-    fi;
-    # check if ring and polynomialTuple are elements of RecNames
-    keyList:=["polynomialRing","degree","polynomialTuple"];
-    rnames:=    RecNames(polSet);
-    if not Length(keyList)=Length(rnames) then 
-    	return false;
-    fi;
-    for key in 	keyList do 
-        if    Position(rnames,key)=false then
-	    	return false;
-	fi;
-    od;
-    if not (IsPolynomialRing(polSet.polynomialRing) ) then
-    	return false;
-    fi;
-    
-    indeterminates := IndeterminatesOfPolynomialRing(polSet.polynomialRing);
-     if   Size(indeterminates)<>2 then
-     	return false;
-     fi;	
-    if   Length(polSet.polynomialTuple)<3 then 
-    	return false;
-    fi;
-    if not IsPosInt(polSet.degree) then 
-    	return false; 
-    fi;
-    smallDegreeCount:=0;
-    for pol in polSet.polynomialTuple do
-       	if not IN(pol,polSet.polynomialRing) then 
-       		return false;
-       	fi;
-    	#if not IsUnivariatePolynomial(pol) then 
-    	#	return false;
-    	#fi;
-    	#TODO: DegreeMultivariatePolynomial temporarily removed
-    	#if DegreeMultivariatePolynomial(pol,polSet.polynomialRing)<>polSet.degree then 
-    	#	return false;
-    	#fi;
-	#if  DegreeMultivariatePolynomial(pol,polSet.polynomialRing)<>polSet.degree then 
-	#	return false;
-    	#	smallDegreeCount:=smallDegreeCount+1;
-    	#fi;
-    od;
-    if smallDegreeCount>1 then 
-    	return false;
-    fi;
-    #todo: check GCD = 1 ?
-    return true;
-end;
-
-
-
-rationalMapFinder@.IsRFSPolynomialSet := NewProperty("IsRFSPolynomialSet", IsObject );
-InstallMethod( rationalMapFinder@.IsRFSPolynomialSet , "IsRFSPolynomialSet   ",[IsObject],IsRFSPolynomialSetFkt@);
-Unbind( IsRFSPolynomialSetFkt@ );
- 
- 
-IsPolynomialListFkt@ := function(polList)
-	local entry;
-	for entry in polList do
-		if not IsPolynomial(entry) then
-			return false;
-		fi;
-	od;
-	return true;
-end;
-
- 
-rationalMapFinder@.IsPolynomialList := NewProperty("IsPolynomialList", IsList );
-InstallMethod( rationalMapFinder@.IsPolynomialList , "IsPolynomialList   ",[IsList],IsPolynomialListFkt@);
-Unbind( IsPolynomialListFkt@ );
-
- 
-createRFSPolynomialSetFkt@ := function(parPolynomialList,rng)
-	local polSetDegree,polSet;
-	Assert(0, rationalMapFinder@.IsPolynomialList(parPolynomialList) );
-	if Size(parPolynomialList)<3 then
-		Error("polynomialTuple shorter than 3");
-	fi;
-	
-	#TODO temporarily removed polSetDegree:= DegreeMultivariatePolynomial(parPolynomialList[1],polSet.polynomialRing);
-	
-	polSetDegree:=[];
-	polSet := rec( polynomialRing:=rng, degree:= polSetDegree, polynomialTuple := parPolynomialList );
-	#SetInfoLevel(InfoWarning,2); 
-	if not rationalMapFinder@.IsRFSPolynomialSet(polSet)  then
-
-		Error("createRFSPolynomialSet failed, use higher InfoWarning level for more info.");
-	fi;
-	return polSet;
-end;
-
-rationalMapFinder@.createRFSPolynomialSet := NewOperation("createRFSPolynomialSet", [ IsObject,  IsPolynomialRing] );
-InstallMethod( rationalMapFinder@.createRFSPolynomialSet , "createRFSPolynomialSet ",[ IsObject, IsPolynomialRing ], createRFSPolynomialSetFkt@);
-Unbind( createRFSPolynomialSetFkt@ );
-
-
-#####################################################################################################################
-## TODO: move examples to documentation!
-
-get43222RFSProblemFkt := function()
-	local shape, shapeList,scalingRelationList,rfsProblem;
-	shape := rationalMapFinder@.createShape([4,3,2,2,2]);
-	shapeList := [ shape,shape,shape ];
-	scalingRelationList := [];
-	rfsProblem := rec(shapeList:=shapeList ,  scalingRelationList:= scalingRelationList);
-	Assert(0,rationalMapFinder@.IsRFSProblem(rfsProblem));
-	return rfsProblem;
-end;
-
-
-
-get43222Char11ExamplePolSetFkt := function()
-	local shape,shapeList,scalingRelationList,rfsProblem,polRing,ind,polSet,s,t,nicePolRing;
-	shape := rationalMapFinder@.createShape([4,3,2,2,2]);
-	shapeList := [ shape,shape,shape ];
-	scalingRelationList:=[];
-	rfsProblem := rec(shapeList:=shapeList ,  scalingRelationList:= scalingRelationList);
-	Assert(0,rationalMapFinder@.IsRFSProblem(rfsProblem));
-	
-	polSet:=rec();
-	 polRing := PolynomialRing(  Field( Z(11)) ,["t","s"] : new );
-	
-	  ind:=IndeterminatesOfPolynomialRing(polRing);
-	 t:=ind[1];
-	 s:=ind[2];
-	 polSet:=rec();
-	 polSet.rfsProblem := rfsProblem; 
-	 polSet.polynomialRing := polRing; 
-	 polSet.polynomialTuple:= [	 (s)^4  *( t -5*s )^3*( t^3 +3*t^2*s +2*t*s^2 +3*s^3 )^2 ,
-					 (t)^4  *( t +3*s )^3*( t^3 -3*t*s^2 -5*s^3 )^2,
-					 (t-s)^4*( t -3*s )^3*( t^3 -2*t*s^2 -3*s^3 )^2];
-
-	 nicePolRing := PolynomialRing(  Rationals ,["t","s"] : new);
-	 polSet.ZZPolRing:=nicePolRing;					 
-         ind := IndeterminatesOfPolynomialRing(nicePolRing);
-	 t := ind[1];
-	 s := ind[2];
-
-	  polSet.polynomialTupleZZLift:= [ (s)^4  *( t -5*s )^3*( t^3 +3*t^2*s +2*t*s^2 +3*s^3 )^2 ,
-					 (t)^4  *( t +3*s )^3*( t^3 -3*t*s^2 -5*s^3 )^2,
-					 (t-s)^4*( t -3*s )^3*( t^3 -2*t*s^2 -3*s^3 )^2];
-
-	Assert(0, rationalMapFinder@.IsRFSPolynomialSet(polSet));
-	return polSet;
-end;
- 
-
-
-# creates polynomials [A,B,C,...] from single rootData with  B-lambdaA = C, B-mueA = D, etc.
-createPolynomialListFromRootDataElemFkt@ := function ( preimageList, polynomialRing )
-	local currentPolynomial,polynomialList, pos,ind, preimageData ;
-	polynomialList := [];
-	 
-	ind := IndeterminatesOfPolynomialRing(polynomialRing);
-	for pos in [1..Size(preimageList)] do
-		currentPolynomial:=1.0;
-		for preimageData in preimageList[pos] do
-			if (preimageData[1]<>infinity) then 
-				currentPolynomial := currentPolynomial*( ( ind[1] - preimageData[1] )^preimageData[2] );
-			#else
-				#currentPolynomial=currentPolynomial 
-			fi;
-			
-		od;
-		Append(polynomialList,[currentPolynomial]);
-	od;
-	return polynomialList; 
-end;
-
-rationalMapFinder@.createPolynomialListFromRootDataElem := NewOperation("createPolynomialListFromRootDataElem", [ IsObject,IsPolynomialRing] );
-InstallMethod( rationalMapFinder@.createPolynomialListFromRootDataElem , "createPolynomialListFromRootDataElem ",[ IsObject,IsPolynomialRing ], createPolynomialListFromRootDataElemFkt@);
-Unbind( createPolynomialListFromRootDataElemFkt@ );
-
-preRationalMapFromRootDataElemFkt@ := function ( rootDataElement, polynomialRing )
-	local polynomialList,rationalMapList, ind,currPos,scalingFactor, num , denom ;
-	polynomialList := rationalMapFinder@.createPolynomialListFromRootDataElem( rootDataElement.preimageLists, polynomialRing ) ;
-	rationalMapList :=[];
-	ind := IndeterminatesOfPolynomialRing(polynomialRing);
-	currPos := 3;
-	for scalingFactor in rootDataElement.scalingFactorList do
-		num := polynomialList[2];
-		denom := polynomialList[1]*scalingFactor;
-		Append(rationalMapList,[ rec( numerator:=num , denominator:=denom ) ] );
-		currPos := currPos+1;
-	od;
-	return rationalMapList;
-end;
-
-rationalMapFinder@.preRationalMapFromRootDataElem := NewOperation("preRationalMapFromRootDataElem", [ IsObject,IsPolynomialRing] );
-InstallMethod( rationalMapFinder@.preRationalMapFromRootDataElem , "preRationalMapFromRootDataElem ",[ IsObject,IsPolynomialRing ], preRationalMapFromRootDataElemFkt@);
-Unbind( preRationalMapFromRootDataElemFkt@ );
-
-
-M2EXEC@ := Filename( DirectoriesSystemPrograms() , "M2");
-	
-ReadPackage("fr","hurwitz/MacaulayMapFinderWrapper.gap");
-ReadPackage("fr","hurwitz/FunctionalStyleInterface.gap");
-#ReadPackage("fr","hurwitz/AllOperations.gap");
-
-
-rationalMapFinder@ := Immutable(rationalMapFinder@);
-	
-
-
-
-
diff --git a/sandbox/hurwitz.kroeker/deprecated/rationalMapFinderSandbox.gap b/sandbox/hurwitz.kroeker/deprecated/rationalMapFinderSandbox.gap
deleted file mode 100644
index 765322d..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/rationalMapFinderSandbox.gap
+++ /dev/null
@@ -1,324 +0,0 @@
-
-# merge RFS  - not for random search and for incomplete characteristics. 
-## in case with different precision, take roots with higher precision.
-# rfsProblem: shapeList, scalingRelations (alternatively , not yet, minimal Polynomials for relations? )
-# RFS: rfsProblem, Options - no!, (Statistics), rfsSetList  ( HTcreate, HTadd; package "orb" )  - at beginning rfsSetTable is empty.
-# rfsSolutionList: polIdealList not emply, equationList not empty, rootList not empty.
-# rfsSet: link to rfsProblem, ( polynomialRing: link to Ring in [s,t], polynomialList), ( idealRing: link to IdealRing, idealList, equationList, rootList)
-# polIdealList - identical for same shape list
-# equationList(final) : depends on shape list and scalingRelations
-# STREAmse: http://www.gap-system.org/Manuals/doc/htm/ref/CHAP010.htmhttp://www.gap-system.org/Manuals/doc/htm/ref/CHAP010.htm
-# http://www.gap-system.org/Manuals/doc/htm/ref/CHAP010.htm
-
-# RECORDS http://www.gap-system.org/Manuals/doc/htm/ref/CHAP027.htm
-# Lists http://www.gap-system.org/Gap3/Manual3/C027S000.htm
-
-# types of Objects : http://www.gap-system.org/Manuals/doc/htm/ref/CHAP013.htm#SECT005
-# Object example: http://www.cs.st-andrews.ac.uk/~alexk/circle/chap2.html
-
-# creating new Objects: http://www.gap-system.org/Manuals/doc/htm/prg/CHAP003.htm#SSEC017.2
-# objects and Elements: http://www.gap-system.org/Manuals/doc/htm/ref/CHAP012.htm#SECT006
-
-# Doku Übersicht: http://www.gap-system.org/Manuals/doc/htm/ref/chapters.htm
-
-# Field: 
-
-
-# - M2-Aufruf für jeden RFSSet einzeln?
-
-LoadPackage ("orb"); # Hash tables.
-
-# TODO:
-# In Future: RFS Object has property searchType with values 'full', 'random'
-# Fehlermeldungen aus Macaulay an GAP weiterreichen...
-
-
-# Structure: RFS; RFS.Problem; RFS.Problem.ShapeList,RFS.Problem.scalingRelations, RFS.PolSetList, 
-# Functions: Create RFS (from RFSProblem)
-# 
-
-# Questions for gap:
-#-------------------
-# how to redirect the stderr output from a Process?
-# how to delete a file and check for file existence?
-# gibtes sowas wie referenzen in GAP?
-# howto define own types?  - partly OK
-# howto define 
-# NULL-value ?
-# corresponding ring of a polynomial?
-# HashTable in gap? -   HTcreate, package "orb"
-# howto define multiple functions in a string and eval them? - InputTextString + Read(input).
-# howto get degree of a Multivariate Polynomial  -DegreeMultivariatePolynomial(), package "guave"
-# how to get all available Methods for a given ObjectType?
-# try catch
-# wie funktionier overloading, falls überhaupt
-# records: kann man vermeiden dass die Einträge alphabetisch geordnet werden?
-
-
-
-# nun ist mir immer noch nicht klar wie minExamples in Zusammenhang mit minChar und maxChar wirken soll
-# hört man in der charakteristik auf, in der das letzte benötigte minExample gefunden wurde, oder 
-#maxchar oder inexamples muss gesetzt sein - erfüllt wenn minexamples >0.
-# glaube es war so: minexamples erreicht=>höre auf;maxchar erreicht =>höre auf.
-# wieso nicht maxexamples: wenn maxchar gesetzt  höre bei maxexamples auf; wenn maxChar gesetzt, wird minChar ignoriert oder darf nicht gesetzt sein.
-# wenn maxchar nicht gesetzt, höre bei minexamples auf.
-#todo: decimalPrecision option!
-# isBound
-# bin zum Schluss gekommen, dass man nur maxExamples braucht.
- 
-
-#rfsProblem: shapeList, scalingRelations
-# example:
-shape := createShape([4,3,2,2,2]);
-IsShape(shape);
-shapeList := [shape,shape,shape];
-IsShapeList(shapeList);
-scalingRelationList:=[];
-IsScalingRelationList(scalingRelationList);
-rfsProblem:=rec(shapeList:=shapeList ,  scalingRelationList:= scalingRelationList);
-IsRFProblem(rfsProblem);
-
-
-
-# todo: translate back scaled Factors in solutionPoints when returning result.
-
-
-coeffRing:=Field( Z(7) );
-rnf:=PolynomialRing(coeffRing,["t","s"]); 
-tensorRing:=PolynomialRing(rnf,["a1","a2"]); 
-ind:=IndeterminatesOfPolynomialRing(rnf);
- t:=ind[1];
- s:=ind[2];
- 
- coeffRing2:=Field( Z(7) );
-rnf2:=PolynomialRing(coeffRing2,["x","y"]); 
-ind:=IndeterminatesOfPolynomialRing(rnf2);
-x:=ind[1];
-y:=ind[2];
- 
-
-
-LoadPackage("guava"); --DivisorsMultivariatePolynomial # factor multivariate Polynomial!
-
-# x:= commonVariable(polSet);
-# y:= homogenVariable(polSet);
-
-DeclareCategory( "IsPolynomialSet", IsMultiplicativeElementWithInverse );
-
-
-
--- howto get a ring when polynomial is given?
-
-IsPolynomialSet := function(polSet)
-    local indeterminates;
-    local rng;
-    if   Length(polSet)<>2 then
-    	return false;
-    
-    rng:=polSet[1];
-    
-    polList:=polSet[2];
-    
-    
-    
-     end;
-
-getSamplePolynomial := function( )
- local indeterminates, coeffRing,rng,pol,t;
- coeffRing:=Field( Z(7) );
- rng:=PolynomialRing(coeffRing,["t" ]); 
- indeterminates :=IndeterminatesOfPolynomialRing(rng);
- t:=indeterminates[1];
- pol:=t+t;
- return pol;
-end;
-
-# not correct for the IdealRing...
-commonVariable := function(rng)
- local indeterminates;
- indeterminates :=IndeterminatesOfPolynomialRing(rng);
- Assert(2,Length(indeterminates));
- return indeterminates[1];
-end;
-
-
-homogenVariable := function(rng)
- local indeterminates;
- indeterminates:=IndeterminatesOfPolynomialRing(rng);
- Assert(2,Length(indeterminates));
- return indeterminates[2];
-end;
-
-
---questions: how to get the Ring of a ringElement
-
-
-KnownAttributesOfObject(pol);
-KnownPropertiesOfObject(pol);
--- liefert z.B. NICHT LeadingCoefficient , CoefficientsRing.
-CoefficientsRing(rnf);
-
---get polynomial summands;
--- get polynomial 
-
---terms: only for MonoidPolynomials...WTF
--- CoefficientsOfUnivariatePolynomial? multivariate pendant
-
- - package mvp not present or does not work
- 
- 
-coeffRing := Field( Z(7) );
-rng:=PolynomialRing( Field(Z(7)) ,["t"] );
-ind:=IndeterminatesOfPolynomialRing(rng);
-t:=ind[1];
-pol:=t+8;
-getRing(pol);
-
-Ideal(rnf,[pol,pol]);
-GeneratorsOfTwoSidedIdeal
-
-Value(s+t,[s],[1]);
-
-String(pol);
-String(rnf);
-
- EvalString
- polString:=" t:= \"t\"; rng := PolynomialRing( Field(Z(7)) ,[t] ); ";
- 
--- funktioniert;
-s := "";; str := OutputTextString(s,false);;
-PrintTo(str,"rnf:=");
-PrintTo(str,rnf);
-PrintTo(str,";");
-PrintTo(str,bla);
-
-PrintTo(str,"commonVariable1 := ");
-PrintTo(str,commonVariable);
-PrintTo(str,";\n");
-PrintTo(str,"homogenVariable1 :=");
-PrintTo(str,homogenVariable);
-PrintTo(str,";\n");
-input:=InputTextString(s);
-Read(input);
-
-
-GroebnerBasis([pol],MonomialLexOrdering()); 
-
-
--
-date:= rec(year:=1992, month:="Jan", day:=13);
-date.year; 
-
-rnames := RecNames(date);
-
-date.( rnames[1] );
-
-polSet:=rec( polynomialRing:=rnf, degree:=1, polynomialList:=[t,t,t] );
-
-
- 
-    #todo: check if the 	
-    
-coeffRing:=Field( Z(7) );
-rnf:=PolynomialRing(coeffRing,["t","s"]); 
-ind:=IndeterminatesOfPolynomialRing(rnf);
- t:=ind[1];
- s:=ind[2];
- 
-polSet:=Immutable (rec( polynomialRing:=rnf, degree:=1, polynomialList:=[t,t,t] ) );
-
-
-polSet1:=rec( polynomialRing:=rnf, degree:=1, polynomialList:=[t,t,t],bla:="bla" );
-polSet2:=rec( polynomialRing:=rnf, degree:=1  );
-
-DeclareOperation("IsRFSPolynomialSet",[IsObject]);
-
-
-DeclareCategory( "RFSPolynomialSet", IsRFSPolynomialSet ); 
-
-
-IN(pol, rng); # das war aber nicht gesucht...
-
-
-DeclareCategory("IsRFSPolynomialSet",
-IsComponentObjectRep);
-DeclareOperation("IsShort",[IsRFSPolynomialSet]);
-DeclareOperation("NrLetters",[IsBlubb]);
-
-
-DeclareOperation("IsRFSPolynomialSet",[IsObject]);
-InstallMethod(IsRFSPolynomialSet,"for Objects",
-[IsObject],IsRFSPolynomialSet1
-);
-
-
-
-
-BindGlobal("BlubbsFamily",NewFamily("BlubbsFamily"));
-
-DeclareCategory("IsBlubb",IsComponentObjectRep and IsAttributeStoringRep);
-
-
-# DeclareCategory("IsBlubb",  IsRFSPolynomialSet); geht nicht...
-
-
-
-
-DeclareRepresentation("IsBlubbDenseRep",
-IsBlubb,["polynomialRing","degree","polynomialList"]);
-
-DeclareRepresentation("IsBlubbDenseRep",
-IsRFSPolynomialSet,["polynomialRing","degree","polynomialList"]);
-
-
-
-BindGlobal("BlubbDenseType",
-NewType(BlubbsFamily,IsBlubbDenseRep));
-
-
-oPolSet:=Objectify(BlubbDenseType,polSet);
-oPolSet1:=Objectify(BlubbDenseType,polSet1);
-oPolSet2:=Objectify(BlubbDenseType,polSet2);
-
-
-IsBlubbDenseRep(oPolSet) ; => true
-IsBlubbDenseRep(oPolSet1) ; => true
-IsBlubbDenseRep(oPolSet2) ; => true (bad);
-
-oPolSet!.polynomialRing;
-
-DeclareOperation("polynomialRing",[IsBlubb]);
-DeclareAttribute("polynomialRing1",IsBlubb);
-DeclareAttribute("degree",IsBlubb);
-DeclareAttribute("tmp",IsBlubb);
-
-
-InstallMethod(polynomialRing,"for dense Blubbs",
-[IsBlubbDenseRep],
-function(bl)
-return bl!.polynomialRing;
-end);
-
-InstallMethod(polynomialRing1,"for dense Blubbs",
-[IsBlubbDenseRep],
-function(bl)
-return bl!.polynomialRing;
-end);
-
-InstallMethod(degree,"for dense Blubbs",
-[IsBlubbDenseRep],
-function(bl)
-return bl!.degree;
-end);
-
-
-
-
-# knownProperties: Attributes with values true/false.
-
-# 1. Problem:  Setxxx wirkt nur bei erster Anwendung...
-# 2. Problem: setzt man die eigenschaft via !.xxx:= , sieht man keine Änderung bei KnownAttributesOfObject(). Und: auf die Eigenschaft kann auch noch nicht zugegriffen werden!
-
- 
-
-
diff --git a/sandbox/hurwitz.kroeker/deprecated/toSort.gap b/sandbox/hurwitz.kroeker/deprecated/toSort.gap
deleted file mode 100644
index cb63c19..0000000
--- a/sandbox/hurwitz.kroeker/deprecated/toSort.gap
+++ /dev/null
@@ -1,245 +0,0 @@
-#SetPackageInfo( rec(
-#  PackageName := "rationalMapFinder",
-#  Version := "1.0beta",
-#  AvailabilityTest := ReturnTrue,
-#  Autoload := false,
-#  BannerString := Concatenation( [
-#      "#I  loading the GAP package ", ~.PackageName," in version ",
-#      ~.Version, "\n" ] ),
-#  PackageDoc := rec(
-#      BookName  := "rationalMapFinder",
-#      SixFile   := "doc/manual.six",
-#      Autoload  := true ) ) );
-
-
-get21212121ProblemFkt := function()
-	local shape,shapeList,scalingRelationList,rfsProblem;
-	shape := createShape([2,1]);
-	shapeList := [ shape,shape,shape,shape ];
-	scalingRelationList:=[[0,-1]];
-	rfsProblem := rec(shapeList:=shapeList ,  scalingRelationList:= scalingRelationList);
-	Assert(true,IsRFSProblem(rfsProblem));
-	return rfsProblem;
-end;
-BindGlobal("get21212121Problem",get21212121ProblemFkt);
-
-getRFSTestProblemFkt := function()
-	local shape,shapeList,scalingRelationList,rfsProblem;
-	shape := createShape([2,1]);
-	shapeList := [ shape,shape,shape,shape ];
-	scalingRelationList:=[ ];
-	rfsProblem:=rec(shapeList:=shapeList ,  scalingRelationList:= scalingRelationList);
-	Assert(true,IsRFSProblem(rfsProblem));
-	return rfsProblem;
-end;
-BindGlobal("getRFSTestProblem",getRFSTestProblemFkt);
-
-
-
-testM2RationalMapSearch := function()
-
-	local m2SearchPathList, rfsObj, partitionList,fieldChar, polTupleList, polTuple, liftOptions, liftedPolTuple,ind,expectedResult,preRationalMap,rationalMap,strictNormalization;
-	
-	# Read("rfsWrapper.gap");
-	
-	LoadPackage("float");
-	SetFloats(MPC);;
-	############# init ###################################
-	
-	# create an object with the interface 'computeFiniteFieldSolutions(..)' and 'approximateComplexSolutions(..)':
-	#rfsObj := createM2RationalMapFinder( "M2", [ Directory("/home/kroeker/bin/") ] );  	
-	rfsObj := createM2RationalMapFinder( "M2", [   ] );  
-	rfsObj.verbose:=true;
-	
-	############# 1. (smart) brute force search for polynomialSets ([A,B,C],...) over given finite field Fp where 
-	#             polynomials A,B and C matches given shapes, gcd(A,B)=gcd(A,C)=gcd(B,C)=1 and  B-lambda*A-C = 0 for some lambda in Fp
-	
-	fieldChar := 7;	partitionList := [ [3], [2,1], [1,2] ]; 
-	strictNormalization := true;
-	polTupleList := rfsObj.computeFiniteFieldSolutions( partitionList, strictNormalization, [], fieldChar );
-	
-	############# 2. try to compute for a result from step (1) a lift to a polynomial ring over extension of Q and a complex approximation 
-	
-	polTuple :=  polTupleList[1];
-		
-	# design decision: liftOptions is an extra object => interface keeps the same while  'liftOptions' is extensible!
-	# todo: createLiftOptions.
-	liftOptions := rec ( decimalPrecision := 16 ); # all following parameters are optional, 
-							# but if   no 'maxLiftDepth' given or was chosen too big,  the computation may run forever and/or consume all memory.
-	liftOptions.maxLiftDepth  := 10;  # lift up to    mod fieldChar^(2^maxLiftDepth) ; 
-	liftOptions.maxLatticeDim := 100; # if no  'maxLatticeDim'  given or was chosen too big, the computation may run forever and/or consume all memory.
-		
-	liftedPolTuple := rfsObj.approximateComplexSolutions( polTuple, liftOptions );
-	
-	## the test part:
-	
-	preRationalMap := preRationalMapFromRootDataElem( liftedPolTuple.rootData[1], liftedPolTuple.liftedPolynomialRing);
-	ind := IndeterminatesOfPolynomialRing( liftedPolTuple.liftedPolynomialRing);
-	expectedResult := 3.0_c*(ind[1]^2)+(-2.0_c*(ind[1]^3));
-	rationalMap := (preRationalMap[1].numerator)/( preRationalMap[1].denominator);
-	Assert(true, rationalMap = expectedResult );
-	
-	
-	# todo: output in case the lift fails.
-	
-	# liftedPolTuple.rootData containts a list  with the preimages of (infty, zero and 1) respectively
-        # the last element of 'rootData' contains the scaling factors [lambda,mue,...] : A-lambda*B=C;  A-mue*B=D; ...
-	
-	############################################
-	
-end;
-
-rationalMapSearch21212121Example := function()
-
-	local m2SearchPathList, rfsObj, partitionList,fieldChar, polTupleList, polTuple, liftOptions, liftedPolTuple,branchValueApproxList,strictNormalization,preRationalMap;
-	
-	# Read("rfsWrapper.gap");
-	
-	LoadPackage("float");
-	SetFloats(MPC);;
-	############# init ###################################
-	
-	# create an object with the interface 'computeFiniteFieldSolutions(..)' and 'approximateComplexSolutions(..)':
-	#rfsObj := createM2RationalMapFinder( "M2", [ Directory("/home/kroeker/bin/") ] );
-	rfsObj := createM2RationalMapFinder(  "M2",[   ] );  	  	
-	
-	############# 1. (smart) brute force search for polynomialSets ([A,B,C,D],...) over given finite field Fp where 
-	#             polynomials A,B C and D matches given shapes, and for all pairs from [A,B,C,D]  gcd  is one ,
-	#	      B - lambda*A = C for some lambda in Fp and
-	#	      B - mue*A    = D with mue = -i*lambda  ( -i is determinated via 'branchValueApproxList'-parameter:
-	#                                                   branchValueApproxList[1][1] := RealPart(-i), branchValueApproxList[1][2] := ImaginaryPart[-i] ).
- 	# 						    First three branch values are omitted and assumed as normalized to [infinity, 0, 1 ]. 
-	
-	fieldChar := 13;	partitionList := [ [1,2], [2,1], [2,1], [2,1] ]; 
-	branchValueApproxList := [ [0/1, -1/2] ]	; # first three branch values ommitted and are assumed [infinity, 0, 1 ].
-	strictNormalization :=false; # if false, the algorithm decides, which factors will be normalized to [infinity, 0, 1 ],
-				     # otherwise first entries of the first three partitions in 'partitionList' determine which factors to normalize.
-	polTupleList := rfsObj.computeFiniteFieldSolutions( partitionList, strictNormalization, branchValueApproxList, fieldChar );
-	
-	############# 2. try to compute for a result from step (1) a lift to a polynomial ring over extension of Q and a complex approximation 
-	
-	polTuple :=  polTupleList[1];
-		
-	# design decision: liftOptions is an extra object => interface keeps the same while  'liftOptions' is extensible!
-	# todo: createLiftOptions.
-	liftOptions := rec ( decimalPrecision := 16 ); # all following parameters are optional, 
-							# but if   no 'maxLiftDepth' given,  the computation may run forever and/or consume all memory.
-	liftOptions.maxLiftDepth  := 10;  # lift up to    mod fieldChar^(2^maxLiftDepth) ; 
-	liftOptions.maxLatticeDim := 100; # if no  'maxLatticeDim'  given, the computation may run forever and/or consume all memory.
-		
-	liftedPolTuple := rfsObj.approximateComplexSolutions( polTuple, liftOptions );
-	
-	preRationalMap := preRationalMapFromRootDataElem( liftedPolTuple.rootData[1], liftedPolTuple.liftedPolynomialRing);
-	
-	# todo: output in case the lift fails.
-	
-	# liftedPolTuple.rootData containts the preimages of (infty, zero and 1) respectively
-        # the last array contains the scaling factors [lambda,mue,...] : A-lambda*B=C;  A-mue*B=D; ...
-	
-	############################################
-	
-end;
-
-
-checkProblem := function()
-	local rfsProblem, searchOptions,resultFileName,rfs,resultVariableName,
-	outputOptions,macaulay2Path,M2SearchPathList;
-	Read("rfsWrapper.gap");
-	rfsProblem := get21212121Problem();
-	rfsProblem := 	getRFSTestProblem();
-	searchOptions := createDefaultRFSOptionList();
-	checkRFSOptionListConsistency(searchOptions);
-	
-	outputOptions:=rec();
-	outputOptions.resultFileName := "43222RFSsearchResult.gap";
-	
-	outputOptions.resultVariableName := "rfsObj";
-	
-	#macaulay2Path :=  Null ;
-	macaulay2Path :=  "/home/kroeker/bin/" ;
-	
-	M2SearchPathList:=[ Directory(macaulay2Path) ];
-	
-	performRFSSearchOverFiniteFields( rfsProblem,searchOptions,outputOptions,M2SearchPathList);
-	Read("43222RFSsearchResult.gap"); 	#sets variable $resultVariableName  (here "rfsObj") !  
-	
-
-
-end;
-
-
-	
-# den Namen der Funktion bzw der Ergebisvariabe die Macaulay in die Datei schreiben solk könnte GAP an Macaulay als Parameter übergben
-checkLift :=function()	
-	local f, rfsProblem, liftOptions,resultFileName,polSet,liftedPolSet,delta,
-		outputFileName, resultVariableName,outputOptions,macaulay2Path,
-		W1,W2,W3,lambda,indeterminates,homogenVariable,solutionIdx;
-	Read("rfsWrapper.gap");
-	macaulay2Path :=  Null ;
-	macaulay2Path :=  "/home/kroeker/bin/" ;
-	
-	checkMacaulayRFSPackagePresence(macaulay2Path);
-	
-	polSet := get43222ExamplePolSet();
-	
-	liftOptions := rec();
-	
-	liftOptions.decimalPrecision := 16;
-
-
-	outputOptions:=rec();
-	outputOptions.resultFileName:="43222LiftResult.gap";	
-	outputOptions.resultVariableName := "liftedPolSet";
-	# additional Parameter 'output style'
-
-	
-	performRFSPolSetLift(polSet,liftOptions,outputOptions,macaulay2Path);
-	
-	Read(outputOptions.resultFileName);# initialises variable "$resultVariableName", here "liftedPolSet"
-	
-	# liftedPolSet:=varName;
-	
-	indeterminates := IndeterminatesOfPolynomialRing (liftedPolSet.liftedPolynomialRing);
-	homogenVariable:= indeterminates[2];
-
-	for solutionIdx in [1..Size(liftedPolSet.polSetFunctionLists) ]do
-
-		W1 := liftedPolSet.polSetFunctionLists[ solutionIdx ][1];	 
-		W2 := liftedPolSet.polSetFunctionLists[ solutionIdx ][2] ;
-		W3 := liftedPolSet.polSetFunctionLists[ solutionIdx ][3];
-		lambda := liftedPolSet.scalingFactorLists[ solutionIdx  ][3-2];
-	
-		W1 := Value(W1,[ homogenVariable ],[1.0]);
-		W2 := Value(W2,[ homogenVariable ],[1.0]);
-		W3 := Value(W3,[ homogenVariable ],[1.0]);
-	
-		f := W2 - lambda*W1 - W3;
-
-		delta := Sqrt(Sum(List(CoefficientsOfUnivariatePolynomial(f),Norm)));
-		Print(delta);
-		Print("\n");
-	od;
-
-	#f:=  (-V1*W1)/ W2 ;
-	#m := IMGMachine(f);
-	#perms := List([1..3],i->PermList(Output(m,i)));
-	#goal := [ (1,5,11,6)(2,3)(4,10)(7,12)(8,13,9),
-	#	 (1,7,13,2)(3,8)(4,5)(6,12)(9,11,10),
-	#	 (1,3,9,4)(2,8)(5,10)(6,7)(11,13,12) ];;
-	#	 
-	#change := RepresentativeAction(SymmetricGroup(13),perms,goal,OnTuples);
-
-
-end;
-
-
-	
-sandbox:=function()
-	
-	#fam:=RationalFunctionsFamily(FamilyObj(1));
-	#PolynomialByExtRepNC(fam,[[1,1],2]);
-end;
-
-
-
-
diff --git a/sandbox/hurwitz.kroeker/examples.xml b/sandbox/hurwitz.kroeker/examples.xml
deleted file mode 100644
index 200ff12..0000000
--- a/sandbox/hurwitz.kroeker/examples.xml
+++ /dev/null
@@ -1,10 +0,0 @@
-<Chapter>
-
-<Header>Solving Hurwitz's Problem</Header>
-
-<Example>
-gap> 1+1;
-2
-</Example
-
-</Chapter>
diff --git a/sandbox/hurwitz.kroeker/examples/fourCV.g b/sandbox/hurwitz.kroeker/examples/fourCV.g
deleted file mode 100644
index 3601d78..0000000
--- a/sandbox/hurwitz.kroeker/examples/fourCV.g
+++ /dev/null
@@ -1,56 +0,0 @@
-################ loading
-
-LoadPackage("float");
-LoadPackage("fr");
-
-RereadPackage("fr","hurwitz/gap/utils.gd");
-RereadPackage("fr","hurwitz/gap/utils.gi");
-
-RereadPackage("fr","hurwitz/gap/padicLift.gd");
-RereadPackage("fr","hurwitz/gap/padicLift.gi");
- 
-RereadPackage("fr","hurwitz/gap/hurwitz.gd");
-RereadPackage("fr","hurwitz/gap/hurwitz.gi");
-
-    
-    
-################################ four CV example draft #################################################################################
-
-    allMapCandidates := []; # collect results here
-    ########### init problem parameters
-    
-	finiteField := GF(13);	partitions := [ [1,2], [2,1], [2,1], [2,1] ]; 	mapDegree := 3;
-	# pairs of rationals approximating real and imaginary part. 
-	branchValuesApprox := [ [infinity,infinity], [0,0], [1,0], [0/1, -1/2] ]; 
-	
-	# reduce critical values to finite field. TODO: pass minimal polynomials to c++ binary instead CV to avoid redundant computation.
-	reducedCritivalValueLists := Hurwitz@FR.ReduceCriticalValuesApprox( branchValuesApprox, finiteField );
-    strictNormalization := true;   
-    
-    liftOptions := @PadicLift.LiftOptions();
-    liftOptions.setDecimalPrecision(24); 	
-	
-    for reducedCriticalValues in reducedCritivalValueLists do           
-        
-        ########## finite field search #################################################      
-
-        mapsModPrime := Hurwitz@FR.FindHurwitzMapModPrime( finiteField  ,partitions, reducedCriticalValues, strictNormalization );
-        
-        if Size(mapsModPrime)>0 then 
-        ########## lift #################################################
-
-            for mapModPrime  in mapsModPrime do 
-                problem       := Hurwitz@FR.HurwitzMapSearchProblem( partitions , branchValuesApprox,  strictNormalization );
-                mapCandidates := Hurwitz@FR.ApproxComplexHurwitzMaps( problem, mapModPrime[2], finiteField, liftOptions );
-                
-                Append( allMapCandidates, mapCandidates);
-           od;
-        ###################################################
-        fi;
-   od;
-  
-   # look at allMapCandidates[i].maxResidue to find good maps !
-###################################################################################################################################
-
-
-
diff --git a/sandbox/hurwitz.kroeker/examples/lift_43222.g b/sandbox/hurwitz.kroeker/examples/lift_43222.g
deleted file mode 100644
index 27caf67..0000000
--- a/sandbox/hurwitz.kroeker/examples/lift_43222.g
+++ /dev/null
@@ -1,46 +0,0 @@
-################ loading
-
-LoadPackage("float");
-LoadPackage("fr");
-
-RereadPackage("fr","hurwitz/gap/utils.gd");
-RereadPackage("fr","hurwitz/gap/utils.gi");
-
-RereadPackage("fr","hurwitz/gap/padicLift.gd");
-RereadPackage("fr","hurwitz/gap/padicLift.gi");
- 
-RereadPackage("fr","hurwitz/gap/hurwitz.gd");
-RereadPackage("fr","hurwitz/gap/hurwitz.gi");
-
-
-################################## [4,3,2,2,2]- example (lifting)  draft ################################## 
-
-
-
-hmsProblem := Hurwitz@FR.HurwitzMapSearchProblem( [[4,3,2,2,2], [3,4,2,2,2], [3,2,4,2,2]], 
-                                                [[infinity,infinity], [0,0], [1,0]], 
-                                                true);
-    
-    #### init lift parameters 
-    finiteField := GF(11);
-    rng := PolynomialRing( finiteField  ,["x"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    polTuple := [];
- 
-    Append( polTuple, [         (x-5)^3*(x^3 +3*x^2 +2*x +3)^2] );
-    Append( polTuple, [   (x)^4*(x+3)^3*(x^3        -3*x -5)^2] );
-    Append( polTuple, [ (x-1)^4*(x-3)^3*(x^3         -2*x-3)^2] );   
-                                               
-    opts := @PadicLift.LiftOptions();   
-    opts.setDecimalPrecision (60);  
-                                                    
-    ##### lift 
-    
-    lifter := Hurwitz@FR.HurwitzMapLifter(polTuple, finiteField, hmsProblem);  
-    approxHurwitzMaps := lifter.computeApproxHurwitzMaps(opts);  
-    
-    ################ check result #########################
-    for mapData in approxHurwitzMaps do    
-       Assert(0, mapData.maxResidue<1.0e-15);
-    od;
diff --git a/sandbox/hurwitz.kroeker/examples/lift_43222_hard.g b/sandbox/hurwitz.kroeker/examples/lift_43222_hard.g
deleted file mode 100644
index a5daf0b..0000000
--- a/sandbox/hurwitz.kroeker/examples/lift_43222_hard.g
+++ /dev/null
@@ -1,60 +0,0 @@
-################ loading
-
-LoadPackage("float");
-LoadPackage("fr");
-
-RereadPackage("fr","hurwitz/gap/utils.gd");
-RereadPackage("fr","hurwitz/gap/utils.gi");
-
-RereadPackage("fr","hurwitz/gap/padicLift.gd");
-RereadPackage("fr","hurwitz/gap/padicLift.gi");
- 
-RereadPackage("fr","hurwitz/gap/hurwitz.gd");
-RereadPackage("fr","hurwitz/gap/hurwitz.gi");
-
- SetInfoLevel(InfoFR,2);
-
-
-################################## [4,3,2,2,2]- example (lifting)  draft ################################## 
-
-    finiteField := GF(23);
-    
- partitions:=  [ [2,3,4,2,2], [2,4,3,2,2], [2,3,4,2,2]];
- cvList := [[infinity,infinity], [0,0], [1,0]];
- 
- reducedCritivalValueLists := Hurwitz@FR.ReduceCriticalValuesApprox( cvList, finiteField );
- 
-    hmsProblem := Hurwitz@FR.HurwitzMapSearchProblem( partitions,  cvList,  true);
-    
-    #### init lift parameters 
-
-    rng := PolynomialRing( finiteField  ,["x"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    polTuple := [];
-         
-    Append( polTuple, [          (x+1)^3*(x-9)^4*(x^2-5*x+1)^2 ] );
-    Append( polTuple, [ (x)^2*(x+11)^3*(x+3)^4*(x^2-x-8)^2 ] );
-    Append( polTuple, [ (x-6)^4*(x-1)^2*(x-2)^3*(x^2+3*x-3)^2] );   
-        
-    
-    # strictNormalization:=true;
-  	# mapsModPrime := Hurwitz@FR.FindHurwitzMapModPrime( finiteField , partitions, reducedCritivalValueLists[1], strictNormalization );           
-    # polTuple :=  mapsModPrime[i][2] ; i in { 1..Size(mapsModPrime) }
-    
-    opts := @PadicLift.LiftOptions();   
-    opts.setDecimalPrecision (60);  
-    opts.setVerboseLevel(2);                                                
-    opts.setMaxLatticeDim(19);
-    ##### lift 
-    
-    lifter := Hurwitz@FR.HurwitzMapLifter(polTuple, finiteField, hmsProblem);  
-    approxHurwitzMaps := lifter.computeApproxHurwitzMapsOptimized(opts);  
-    
-    ################ check result #########################
-    for mapData in approxHurwitzMaps do    
-       Assert(0, mapData.maxResidue<1.0e-15);
-    od;
-    
-    
-    
diff --git a/sandbox/hurwitz.kroeker/examples/threeCV.g b/sandbox/hurwitz.kroeker/examples/threeCV.g
deleted file mode 100644
index 69ecf51..0000000
--- a/sandbox/hurwitz.kroeker/examples/threeCV.g
+++ /dev/null
@@ -1,53 +0,0 @@
-################ loading
-
-LoadPackage("float");
-LoadPackage("fr");
-
-RereadPackage("fr","hurwitz/gap/utils.gd");
-RereadPackage("fr","hurwitz/gap/utils.gi");
-
-RereadPackage("fr","hurwitz/gap/padicLift.gd");
-RereadPackage("fr","hurwitz/gap/padicLift.gi");
- 
-RereadPackage("fr","hurwitz/gap/hurwitz.gd");
-RereadPackage("fr","hurwitz/gap/hurwitz.gi");
-
-
-################################ three CV example #############################################################################
-
-    approxHurwitzMapCandidates:=[];    #result accumulator
-    
-   ############# init parameters
-   
-	finiteField := GF(11);  permutations := [(1,2,3),(2,3),(1,2)];
-
-	complexCriticalValuesApprox := [ [infinity,infinity],     [0,0],           [ 1/1, 0 ]     ]; 
-	modPrimeCriticalValues      := [      infinity,      Zero(finiteField),  One(finiteField) ];
-    hurwitzMapSearchProblem := Hurwitz@FR.HurwitzMapSearchProblem( permutations , complexCriticalValuesApprox);        
-	
-   ############# finite field search
-   
-	mapsModPrime := Hurwitz@FR.FindHurwitzMapModPrime( finiteField , permutations, modPrimeCriticalValues );
-	 
-   ############# lift and approximate Hurwitz map candidates
-	
-    for  mapModPrime  in mapsModPrime do 
-        mapCandidates := Hurwitz@FR.ApproxComplexHurwitzMaps( hurwitzMapSearchProblem, 
-                                                      mapModPrime[2], 
-                                                      finiteField, 
-                                                      @PadicLift.LiftOptions() 
-                                                    );
-        Append( approxHurwitzMapCandidates, mapCandidates); 
-    od;
-    
-   ############# check if result matches expectations ("Algorithmic construction of Hurwitz maps",  page 3)
-   
-    z := approxHurwitzMapCandidates[1].indeterminate;
-    Assert(0, Degree( ( 3*z^2+(-2.0*z^3) ) / approxHurwitzMapCandidates[1].map ) =0);  
-   
-#################################################################################################################################
-
-
-
-   
-   
diff --git a/sandbox/hurwitz.kroeker/gap/hurwitz.gd b/sandbox/hurwitz.kroeker/gap/hurwitz.gd
deleted file mode 100644
index 966b770..0000000
--- a/sandbox/hurwitz.kroeker/gap/hurwitz.gd
+++ /dev/null
@@ -1,135 +0,0 @@
-#############################################################################
-##
-#W hurwitz.gd                                               Laurent Bartholdi
-##                                                               Jakob Kröker
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2012, Laurent Bartholdi
-##
-#############################################################################
-##
-##  Solutions to the Hurwitz problem
-##
-#############################################################################
-
-
-# depends on :   package 'Float',  "hurwitz/gap/utils",  "hurwitz/gap/padicLift"
-#
-
-
-
-Hurwitz@FR := rec();
-
-DeclareGlobalFunction( "Hurwitz@FR.");
-Hurwitz@FR.Tests    := rec();
-Hurwitz@FR.Internal := rec();
-
-
-#DeclareGlobalFunction( "Hurwitz@FR.Internal");
-DeclareGlobalFunction( "Hurwitz@FR.Internal.");
-
-
-# hack:  ( switch HURWITZMAPSEARCHBIN for debug/development).
-# Problem will disappear in case build system is ready ( TODO )
-# HURWITZ_MAP_SEARCH_BIN@FR := Filename( [Directory("/home/kroeker/rationalFunctionSearch/c-program/bin")],  "hurwitzMapSearchForGAP.mathpc26" );
-
-HURWITZ_MAP_SEARCH_BIN@FR := Filename(  DirectoriesPackagePrograms("fr") ,  "hurwitzMapSearch" );
-
-
-########################################## FIND HURWITZ MAP OVER A FINITE FIELD #####################################################
-
-
-# create a representation for multiplicity structure of a polynomial
-# Parameter: integer partition. 
-DeclareGlobalFunction("Shape@FR");
-Hurwitz@FR.Shape := Shape@FR;
-DeclareGlobalFunction( "Hurwitz@FR.Shape" );
-
-DeclareGlobalFunction("IsShape@FR");
-Hurwitz@FR.IsShape := IsShape@FR;
-#DeclareGlobalFunction( "Hurwitz@FR.IsShape" );
-
-
-# computes the shape of an univariate polynomial. 
-# A shape is here a desc-ordered list of root multiplicities.
-# Parameters: (polynomial, [expected degree] )
-# the optinal parameter 'expected degree' is required to determine the shape correctly if the polynomial has infinity root factor.
-DeclareOperation("ComputeShape@FR", [ IsPolynomial, IsInt ] );
-Hurwitz@FR.ComputeShape := ComputeShape@FR;
-DeclareGlobalFunction( "Hurwitz@FR.ComputeShape" );
-
-
-# get the multiplicity of a univariate polynomial root
-# Parameters: ( polynomial  over a finite field,  root, [ poldegree] ) 
-# poldegree is passed to get the correct multiplicity of the infinity root.
-DeclareOperation( "RootMultiplicity@FR", [ IsUnivariatePolynomial, IsObject, IsInt ] );
-Hurwitz@FR.RootMultiplicity := RootMultiplicity@FR;
-DeclareGlobalFunction( "Hurwitz@FR.RootMultiplicity" );
-
-# find a solution for a Hurwitz map problem over a finite field. 
-#Parameters: ( prime field, permutations, criticalValues )
-#      or :  ( prime field, shapes,       criticalValues, strictNormalization(bool) )
-# preconditions: product of the permutations is =1; all shapes have same degree; number of shapes/permutations and criticalValues matches.
-DeclareOperation( "FindHurwitzMapModPrime@FR", [ IsPrimeField, IsList, IsList ] );
-Hurwitz@FR.FindHurwitzMapModPrime := FindHurwitzMapModPrime@FR;
-DeclareGlobalFunction( "Hurwitz@FR.FindHurwitzMapModPrime" );
-
-
-# compute the search space size for a Hurwitz map search problem over a given finite field.
-# Parameters: ( prime field, permutations, criticalValues )
-DeclareOperation( "HurwitzMapSearchSpaceSize@FR", [ IsPrimeField, IsList, IsList, IsBool ] );
-Hurwitz@FR.HurwitzMapSearchSpaceSize := HurwitzMapSearchSpaceSize@FR;
-DeclareGlobalFunction( "Hurwitz@FR.HurwitzMapSearchSpaceSize" );
-
-
-
-
-##################### LIFT FINITE FIELD HURWITZ MAP TO RATIONALS/COMPLEX NUMBERS ###########################
-
-
-# create a Hurwitz map search problem 
-# Parameters: ( partitions, criticalValues, strictNormalization (bool) )
-# or 
-# Parameters: ( partitions, criticalValues, normalizationRules)
-# expect first critival values to be infinity, zero, one  and the following to be 'rational number approximations'
-# 'rational number approximations' :  pairs of real and imaginary parts  of an rational approximation .
- DeclareOperation( "HurwitzMapSearchProblem@FR", [IsList, IsList, IsBool] );
-Hurwitz@FR.HurwitzMapSearchProblem := HurwitzMapSearchProblem@FR;
-
-# Parameter:  ( hurwitzMapSearchProblem, polynomial list W_i mod prime , finiteField, liftOptions )
-# for liftOptions see LiftOptions@FR
-DeclareGlobalFunction( "ApproxComplexHurwitzMaps@FR");
-Hurwitz@FR.ApproxComplexHurwitzMaps := ApproxComplexHurwitzMaps@FR;
-
-
-########## functions required for customizing lift: 
-########## e.g using  normalization different from default ( preimage( inf,0, 1) = (inf,0,1) )
-
-# given a rational approximation of a complex root a+ib (a pair of real and imaginary part approximations ),
-# create a minimal polynomial for roots [a+ib, a-ib]  over integers  using the second parameter 'variable' as indeterminate.
-DeclareGlobalFunction( "RationalMinPolyFromRootApprox@FR");
-Hurwitz@FR.RationalMinPolyFromRootApprox := RationalMinPolyFromRootApprox@FR;
-
-
-# create a normalization rule 
-# Parameters_: (polynomialId, multiplicity, rootValue)
-DeclareGlobalFunction( "NormalizationRule@FR" );
-Hurwitz@FR.NormalizationRule := NormalizationRule@FR;  
-
-
-DeclareGlobalFunction( "IsNormalizationRule@FR" );
-Hurwitz@FR.NormalizationRule := NormalizationRule@FR;  
-
-# Parameters ( polTuple, finiteField, HurwitzMapSearchProblem )
-# rename to PolSet HurwitzMap or ReducedHurwitzMap ?
-DeclareGlobalFunction( "HurwitzMapLifter@FR" );
-Hurwitz@FR.HurwitzMapLifter := HurwitzMapLifter@FR;
-
-
-
-MakeImmutable( Hurwitz@FR.Tests );
-MakeImmutable( Hurwitz@FR.Internal );
-
-MakeImmutable( Hurwitz@FR );
-MakeReadOnlyGlobal("Hurwitz@FR");
diff --git a/sandbox/hurwitz.kroeker/gap/hurwitz.gi b/sandbox/hurwitz.kroeker/gap/hurwitz.gi
deleted file mode 100644
index b36b5b0..0000000
--- a/sandbox/hurwitz.kroeker/gap/hurwitz.gi
+++ /dev/null
@@ -1,2266 +0,0 @@
-#############################################################################
-##
-#W hurwitz.gi                                               Laurent Bartholdi
-##                                                               Jakob Kröker
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2012, Laurent Bartholdi
-##
-#############################################################################
-##
-##  Solutions to the Hurwitz problem
-##
-#############################################################################
-
-
-
-# Notes: 'BindGlobal' will hide a function from GLOBAL_FUNCTION_LIST, 
-#
-# but the variable will appear in NamesGVars(); 
-
-# bugs: DeclareGlobalFunction(""); is allowed. 
-
-# not working AdditiveInverse for RationalFunction? 
-
-# todo: numthread parameter for c++ program.
-#
-# todo: normalization: somtimes there exists different normalizations what makes mathematically no difference, but may influence lifting performance
-#       currently the first appropriate normalization is used. Alternatively: try to lift finite field hurwitz maps with severel normalizations
-
-
-######################## a hack to represent a linear factor with infinity root.
-
-DeclareRepresentation("IsInfinityPol@FR",IsList, [ ]);
-
-BindGlobal("InfinityRootPolynomialType@FR",  NewType( ListsFamily, IsInfinityPol@FR ) );
-
-BindGlobal("InfinityRootPolynomial@FR", Objectify( InfinityRootPolynomialType@FR,   rec ( type:="representation of a polynomial with infinity root")  ) );
-
-MakeImmutable(InfinityRootPolynomial@FR);
-
-DeclareOperation("\^", [IsInfinityPol@FR, IsInt] );
-
-InstallMethod(\^,  [IsInfinityPol@FR ,IsInt ],
-function( infrootpol, exp )
-    return infrootpol;
-end
-);
-######################### end hack
-
-
-# parameter: (pairs of real and imaginary part of complex critival value approximations, destination finite field)
-#Hurwitz@FR.ReduceCriticalValuesApprox :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR"], "ReduceCriticalValuesApprox", 
-function(critivalValueApproxList, finiteField)
-    
-    local polRing, variable, minpoly, minpolynomials, reducedValueList, tmpReducedValueList, point, newPoint,element;
-    polRing := PolynomialRing(Rationals,["z"]);
-	variable := IndeterminatesOfPolynomialRing(polRing)[1];
-	minpoly := RationalMinPolyFromRootApprox@FR([0/1, -1/2], variable);
-	
-	minpolynomials :=  List( critivalValueApproxList, elem->RationalMinPolyFromRootApprox@FR (elem, variable ));
-	
-    reducedValueList := [ [] ];
-	for minpoly in minpolynomials do 
-	    tmpReducedValueList := [ ];
-	    
-	    if minpoly=InfinityRootPolynomial@FR then
-	      for point in reducedValueList do
- 	               newPoint := Concatenation(point, [infinity] );
-	           Append(tmpReducedValueList, [newPoint ] );
-	      od;
-          reducedValueList :=  tmpReducedValueList;
-	      continue;
-	   fi;
-	            
-	    for element in Elements(finiteField) do
-	        
-	        if IsZero( Value(minpoly,[variable], [element] )) then
-	            for point in reducedValueList do
-	                newPoint := Concatenation(point, [element] );
-	                Append(tmpReducedValueList, [ newPoint ] );
-	            od;
-	        fi;
-	    od;
-	    reducedValueList :=  tmpReducedValueList;
-	   
-	od;
-    tmpReducedValueList := reducedValueList ;
-	reducedValueList := [ ];
-    for point in tmpReducedValueList do
-        if IsDuplicateFree(point) then 
-            Append(reducedValueList, [point] );
-        fi;
-    od;
-    return reducedValueList;
-end
-);
-    
-    
-#Hurwitz@FR.Internal.RationalPairToComplex :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "RationalPairToComplex", 
-function( pair )
-
-    Assert(0, IsList(pair) and Size(pair)=2);
-    if pair[1]=infinity or pair[2]=infinity then
-        Assert(0,    pair[1]=infinity and pair[2]=infinity);
-        return infinity;
-    fi;
-    Assert(0, pair[1] in Rationals and  pair[2] in Rationals );
-    return ( pair[1]*1.0_c + pair[2]*1.0i_c);
-end
-);
-
-
-#Hurwitz@FR.Tests.TEST_RATIONAL_PAIR_TO_COMPLEX :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_RATIONAL_PAIR_TO_COMPLEX", 
-function()
-    Assert (0, infinity = Hurwitz@FR.Internal.RationalPairToComplex([infinity,infinity]) );
-    Assert (0,        0.0_c = Hurwitz@FR.Internal.RationalPairToComplex([0,0]) );
-    Assert (0,        1.0_c = Hurwitz@FR.Internal.RationalPairToComplex([1,0]) );
-end
-);
-
-
-InstallGlobalFunction( Shape@FR, 
-function( partition )
-	local shape, shapeRec;
- 	if not  IsList( partition ) or not ForAll( partition, IsPosInt) then
- 		Error("constructing shape: expected a list of positive integers");
- 	fi;
-        shape := ShallowCopy(partition);
-	Sort(shape);
-	shape := Reversed(shape);
-	shapeRec := rec();
-	shapeRec.partition := Immutable(shape);
-	shapeRec.degree := Sum(shape) ;
-	shapeRec.dataType := "Shape";
-	return Immutable(shapeRec);
-end
-);
-
-
-# DeclareGlobalFunction( "IsShape@FR" );
-InstallGlobalFunction( IsShape@FR, 
-function( shape )
-	if not IsRecord(shape) 
-	or not "dataType"  in RecNames(shape)
-	or not shape.dataType="Shape" 
-	or not "partition"  in RecNames(shape)
-	or not "degree" in RecNames(shape)
-	or not IsPosInt(shape.degree)
-	or not IsList(shape.partition)
-	or not ForAll(shape.partition, IsPosInt)
-	or not shape= Shape@FR(shape.partition) then
-		return false;
-	fi;	
-	return true;
-end
-);
-
-
-
-# ComputeShape@FR: computes the shape of an univariate polynomial over rationals, integers or galois fields.
-# the parameter 'expected degree' is required to determine the shape correctly if the polynomial has infinity root factor.
-
-# depends on DISTINCT_MONIC_FACTORS.
-
-InstallOtherMethod( ComputeShape@FR, 
-"compute the shape of an univariate polynomial. Parameters: polynomial, [expected degree] ",  [ IsPolynomial, IsInt ],
-function( polynomial, expectedDegree )
-  
-	local shape, factors, factor, i, multiplicity, tmp;
-	if not IsUnivariatePolynomial(polynomial) and 
-	   not (IsHomogenized@FR@Utils(polynomial) and IndeterminateNumber@FR(polynomial)=2 ) then
- 		Error("ComputeShape@FR: fist parameter is not an univariate or homogenized polynomial");
- 	fi;
- 	if not IsInt(expectedDegree) or IsNegInt(expectedDegree) then
- 		Error("ComputeShape@FR: second parameter is not a nonnegative integer");
- 	fi;
- 	if IsHomogenized@FR@Utils(polynomial) then
-     	polynomial := DehomogenizedPolynomial@FR@Utils(polynomial);
-    fi;
- 	# todo: only accept polynomials over rationals, integers or over finite fields. How to check?
-	shape := [];
-	factors := DistinctMonicFactors@FR( polynomial) ;
-	Degree@FR@Utils(polynomial);
-	for factor in factors do
-		tmp:=polynomial;
-		multiplicity := 0;
-		tmp:=tmp/factor;
-		while Degree( DenominatorOfRationalFunction(tmp) )<=0 do
-			tmp := tmp/factor;
-			multiplicity:=multiplicity+1;
-		od;
-		
-		for i in [ 1..Degree(factor) ] do
-			Append( shape, [multiplicity] );
-		od;
-	od;
-	if Sum(shape)<expectedDegree then
-		Append( shape,  [expectedDegree- Sum(shape)] );
-	fi;
-	return Shape@FR(shape);
-	#Sort(shape);
-	#return Reversed(shape);
-end 
-);
-
-
- InstallOtherMethod( ComputeShape@FR,
-  "compute the shape of an univariate polynomial. Parameters: polynomial, [expected degree]", [ IsPolynomial  ], 
-function( polynomial )
- 	return ComputeShape@FR(polynomial, Degree@FR@Utils(polynomial)) ;
- end
-);
-
-
-#Hurwitz@FR.Tests.TEST_COMPUTE_SHAPE :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_COMPUTE_SHAPE", 
-function()
-	local rng, ind, x,y,  pol, hpol, shape;
-	rng := PolynomialRing(Rationals, ["x","y"] );
-	ind :=IndeterminatesOfPolynomialRing(rng);
-	x := ind[1];
-	pol := 3*(x+1)*(x+2)^2;
-	 
-	shape := ComputeShape@FR( pol );
-	Assert(0, shape.partition= [2,1] );
-	hpol := HomogenizedPolynomial@FR@Utils(pol,y);
-    shape := ComputeShape@FR( hpol );
-	Assert(0, shape.partition= [2,1] );
-	
-	hpol := HomogenizedPolynomial@FR@Utils(pol,y,6);
-    shape := ComputeShape@FR( hpol );
-	Assert(0, shape.partition= [3,2,1] );
-	
-	
-	rng := PolynomialRing( Integers, ["x"] );
-	ind :=IndeterminatesOfPolynomialRing(rng);
-	x := ind[1];
-	pol := (x+1)*(x+2)^2;
-	 
-	shape := ComputeShape@FR( pol );
-	Assert(0, shape.partition= [2,1] );
-	
-	rng := PolynomialRing( GF(11), ["x"] );
-	ind :=IndeterminatesOfPolynomialRing(rng);
-	x := ind[1];
-	pol := 5*(x+1)*(x+2)^2;
-	 
-	shape := ComputeShape@FR( pol );
-	Assert(0, shape.partition= [2,1] );
-
-    rng := PolynomialRing( GF(121), ["x"] );
-	ind :=IndeterminatesOfPolynomialRing(rng);
-	x := ind[1];
-	pol := (x+1)*(x+2)^2;
-	 
-	shape := ComputeShape@FR( pol );
-	Assert(0, shape.partition= [2,1] );
-	
-	
-	rng := PolynomialRing( ZmodnZ(121), ["x"] );
-	ind :=IndeterminatesOfPolynomialRing(rng);
-	x := ind[1];
-	pol := (x+1)*(x+2)^2;
-
-	# shape := ComputeShape@FR( pol );    # fails !
-	#Assert(0, shape.partition= [2,1] );	
-end
-);
-
-
-
-# get the multiplicity of a root in an univariate polynomial over a finite field.
-# poldegree is passed to get the correct multiplicity of the infinity root.
-InstallOtherMethod( RootMultiplicity@FR, "", [IsUnivariatePolynomial, IsObject, IsInt ],
-
-function( polynomial,root, poldegree ) 
-	local mapFactors, rootMultiplicity, factor;
-	if not IsUnivariatePolynomial(polynomial) then
- 		Error("RootMultiplicity: first parameter is not a univatiate polynomial");
- 	fi;
- 	Assert(0 , poldegree >= Degree(polynomial));
- 	
- 	if root=infinity then
-		if Degree(polynomial)<=poldegree and root=infinity then 
-			return poldegree-Degree(polynomial);
-		fi;
-		Assert(0, false);
-	fi;
-	
-	mapFactors := Factors( polynomial );	 
-	rootMultiplicity := 0;
-	for factor in mapFactors do	
-		if IsZero(Value(factor, root)) then
-			rootMultiplicity := rootMultiplicity+Degree(factor);	
-		fi;
-	od;	 
-	return rootMultiplicity;
-end
-);
-
-
-InstallOtherMethod( RootMultiplicity@FR, "", [ IsUnivariatePolynomial, IsObject ],
-function( polynomial,  root ) 
-	 return RootMultiplicity@FR(polynomial, root, Degree( polynomial) );
-end
-);
-
-
-# Hurwitz@FR.Tests.TEST_ROOT_MULTIPLICITY :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_ROOT_MULTIPLICITY", 
-function()
-	local rng, ind, x, pol,polDegree; 
-	
-	rng := PolynomialRing( GF(121), ["x"] );
-	ind :=IndeterminatesOfPolynomialRing(rng);
-	x := ind[1];
-	pol := (x+1)*(x+2)^2;
-
-	Assert(0, 0= RootMultiplicity@FR( pol, -3 ));
-		
-	Assert(0, 2= RootMultiplicity@FR( pol, -2 ));
-	Assert(0, 1= RootMultiplicity@FR( pol, -1 ));
-	polDegree := 4;
-	Assert(0, 1= RootMultiplicity@FR( pol, infinity, polDegree ) );
-end
-);
-
-
-
- 
-# transform values to homogen coordinates
-#Hurwitz@FR.Internal.HomogenizeValues :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "HomogenizeValues", 
-function( values, field )
-	local ValuesHom,i;
-	 ValuesHom := List ( [1..Size(values)],n->0 );
-	    for i in [1..Length(values)] do
-		if values[i]=infinity then       	
-			 ValuesHom[i] := [One(field), Zero(field)]; 
-		else 
-			ValuesHom[i] := [values[i], One(field)]; 
-		fi;
-			
-	    od;
-	    return ValuesHom;
-end
-);
-
-
-# Hurwitz@FR.Tests.TEST_HOMOGENIZE_VALUES :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_HOMOGENIZE_VALUES", 
-function()
-	local field, values, homValues;
-	field := GF(11);
-	
-	values := [ One(field), Zero(field), infinity , One(field)*5];
-	homValues :=  Hurwitz@FR.Internal.HomogenizeValues( values, field );
-	Assert(0, Size(homValues)=Size(values) );
-	Assert(0, homValues[1]=[One(field),One(field)]);
-	Assert(0, homValues[2]=[Zero(field),One(field)]);
-	Assert(0, homValues[3]=[One(field),Zero(field)]);
-	Assert(0, homValues[4]=[5*One(field),One(field)]);
-end
-);
-
-
-# transform homogen coordinates to ordinary coordinates
-# Hurwitz@FR.Internal.DehomogenizeValues := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "DehomogenizeValues", 
-function( ValuesHom )
-	local values,i;
-	 values := List ( [1..Size(ValuesHom)], n->0 );
-	    for i in [1..Length(values)] do
-		if IsZero(ValuesHom[i][2]) then       	
-			 values[i] := infinity;
-		else 
-			values[i] := ValuesHom[i][1]/ValuesHom[i][2]; 
-		fi;
-			
-	    od;
-	    return values;
-end
-);
-
-
-#Hurwitz@FR.Tests.TEST_DEHOMOGENIZE_VALUES :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_DEHOMOGENIZE_VALUES", 
-function()
-	local field, values, homValues, deHomVal;
-	field := GF(11);
-	
-	values := [ One(field), Zero(field), infinity , One(field)*5];
-	homValues :=  Hurwitz@FR.Internal.HomogenizeValues( values, field );
-	deHomVal :=  Hurwitz@FR.Internal.DehomogenizeValues(homValues);
-	Assert(0, values=deHomVal);
-end
-);
-
-
-
-# InstallGlobalRecordOperation@FR ( ["Hurwitz@FR"], "LinearHomogenFactorCoordinates", 
-#  [IsPolynomial, IsPolynomial] 
-# );
-
-# Hurwitz@FR.ComputeFactorNormalizationMap
-InstallGlobalRecordFunction@FR ( [ "Hurwitz@FR" ], "ComputeTupleNormalizationMap", 
-function(soureceHomogenCoordinates,  commonVariable, homogenVariable)
-    local matrix, resMap,localSoureceHomogenCoordinates;
-    
-    # homogen source coordinates to roots (sign change)
-    localSoureceHomogenCoordinates := List(soureceHomogenCoordinates,hcoord->[hcoord[1], -hcoord[2] ] );
-    
-    matrix := Hurwitz@FR.Internal.ComputeCVNormalizationMap(localSoureceHomogenCoordinates);
-    matrix:=matrix^-1;
-    resMap := [  commonVariable *matrix[1][1]+ homogenVariable*matrix[1][2],
-                commonVariable *matrix[2][1]+homogenVariable*matrix[2][2] ];
-                            
-    return resMap;
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TestComputeTupleNormalizationMapEx", 
-function()
-    local finiteField,finiteFields, rng, ind, elements , values, coercedValues, permutation, dstValues, dstPermutation, map;
-    
-    finiteFields := [ GF(11), GF(7), GF(13), GF(17) ];
-    for finiteField in finiteFields do 
-        rng:=PolynomialRing(finiteField,["x","y"]);
-        ind:= IndeterminatesOfPolynomialRing(rng);        
-        elements := ShallowCopy(Elements(finiteField));
-        Append(elements, [infinity]);
-        for values in Combinations(elements,3) do
-        #values:= [1,2,3];
-            for permutation in PermutationsList(values) do
-             for dstValues in Combinations(elements,3) do
-        #values:= [1,2,3];
-            for dstPermutation in PermutationsList(dstValues) do
-                map:= Hurwitz@FR.ComputeTupleNormalizationMapEx( HomogenizeValues@Hurwitz@FR(permutation,dstPermutation, finiteField),ind[1],ind[2] );
-                if fail=map then
-                    Info( InfoFR, 1, String(permutation) );
-                fi;
-                Print(map);            Print("\n");
-                Assert(0, not map=fail);
-            od;
-        od;    od;
-        od;   
-    od;
-end
-);
-
-
-# Hurwitz@FR.ComputeFactorNormalizationMap
-InstallGlobalRecordFunction@FR ( [ "Hurwitz@FR" ], "NormalizePolynomialTuple", 
-function( polTuple, hmsProblem )
-
-    local pol, ind, map, homogenVar, homogenizedPolynomialTuple, normalizedPolynomialTuple,
-    linearFactorsList,linearFactors,  linearFactorHomogenCoordinates,degree;
-
-    if not IsList(polTuple) then
-        Error("expected first parameter to be a tuple of univariate polynomials");
-    fi;
-    Assert(0, Size(hmsProblem.normalizationRules)=3 );
-    Assert(0, Size(polTuple)>=3 );
-        
-    pol := polTuple[1];
-    
-    degree := Maximum(List(polTuple, el->Degree@FR@Utils(el) )  );
-    
-    # a polynomial can be empty if it has only infinite root!
-    for pol in polTuple do
-        ind := IndeterminatesOfPolynomial@FR@Utils(pol);
-        Assert(0, Size(ind)<=1);        
-        if  Size(ind)>0 then 
-            break;
-        fi;
-    od;
-    Assert(0, Size(ind)=1);        
-
-    
-    homogenVar := Indeterminate(CoefficientsFamily(FamilyObj(pol)),1);
-    if homogenVar =ind[1] then
-        homogenVar := Indeterminate(CoefficientsFamily(FamilyObj(pol)),2);
-    fi;
-    Append(ind,[homogenVar]);
-        
-    homogenizedPolynomialTuple := List(polTuple, pol-> HomogenizedPolynomial@FR@Utils(pol,homogenVar,degree ) );
-           
-     
-    linearFactorsList := List([1,2,3], idx-> LinearFactors@FR@Utils( homogenizedPolynomialTuple[idx], 
-                                                                     hmsProblem.normalizationRules[idx].multiplicity
-                                                                   )   );
-                             
-    
-    for linearFactors in linearFactorsList do
-        if Size(linearFactors)=0 then
-            Error("Normalization failed: polynomial tuple has not linear factors of desired multiplicities");
-        fi;
-    od;
-    
-    linearFactors  := List(linearFactorsList, list->list[1] );    
-    linearFactorHomogenCoordinates := List(linearFactors, elem->Coefficients@FR(elem, [ ind[2],ind[1] ] )  ); 
-    
-    map := Hurwitz@FR.ComputeTupleNormalizationMap(linearFactorHomogenCoordinates, ind[1] ,homogenVar );       
-    
-    normalizedPolynomialTuple :=  List(homogenizedPolynomialTuple,elem->  Value(elem,ind,map)   );
-    normalizedPolynomialTuple :=  List(normalizedPolynomialTuple,elem->ind[1]^0*DehomogenizedPolynomial@FR@Utils(elem, homogenVar ) );
-    
-    return normalizedPolynomialTuple;
-end
-);
-
-
-
-# compute a map which transforms first three critical values to (infinity, 0, 1).
-# parameter: critical values in homogen coordinates.
-#Hurwitz@FR.Internal.ComputeCVNormalizationMap :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "ComputeCVNormalizationMap", 
-function( criticalValuesHom )
-	local mat, i, idx;
-	 Assert( 0, IsList( criticalValuesHom ) );
-	 Assert( 0, Size(criticalValuesHom) >= 3 );
-	 # normalize homogen coordinates. # todo: write a function which normalizes homogen coordinates!
-     for idx in [1..Size(criticalValuesHom)] do 
-        if not IsZero(criticalValuesHom[idx][2]) then
-             criticalValuesHom[idx][1]:=criticalValuesHom[idx][1]/criticalValuesHom[idx][2];
-            criticalValuesHom[idx][2]:=criticalValuesHom[idx][2]/criticalValuesHom[idx][2];
-          
-        else
-            criticalValuesHom[idx][1]:=criticalValuesHom[idx][1]/criticalValuesHom[idx][1];
-        fi;
-     od;
-     if Size(Set(criticalValuesHom))<Size(criticalValuesHom) then
-        Error(" critical values has to be distinct!");
-     fi;
-     
-	 mat := [ [ criticalValuesHom[2][2], -criticalValuesHom[2][1]  ] , [ criticalValuesHom[1][2],-criticalValuesHom[1][1]] ];
-  	 i := mat*criticalValuesHom[3];
-    	 mat := -[ mat[1]*i[2], mat[2]*i[1] ];   
-    	 return mat;
-end
-);
-
-# is this correct??? How it should look for a homogenized polynomial with more than 1 dimension? (more than 1 common variable)?
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "HomogenCoordinates", 
-function( linearFactor, commonVar, homogenVariable )
-    local ind, polVar;
-    Assert(0, not commonVar=homogenVariable);
-        
-    if not IsPolynomial(linearFactor) or 
-       not @FR@Utils.IsHomogenized(linearFactor) or 
-       not @FR@Utils.Degree(linearFactor)=1 or 
-       not @FR@Utils.IndeterminateNumber(linearFactor)<=2 then
-        Error("expected homogenized linear factor (two variables) ");
-    fi;
-    ind := @FR@Utils.IndeterminatesOfPolynomial(linearFactor);
-    for polVar in ind do
-        if not homogenVariable in [commonVar, homogenVariable] then 
-            Error(" wrong  variables... ");
-        fi;
-    od;
-    return Coefficients@FR(linearFactor, [ homogenVariable, commonVar ] );
-end
-);
-
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_HOMOGEN_COORDINATES", 
-function( )
-    local rng, ind, x, y, linearFactor,homogenCoord,homogenVariable;
-    rng := PolynomialRing( GF(121), ["x","y"] );
-	ind :=IndeterminatesOfPolynomialRing(rng);
-	x := ind[1];
-	y := ind[2];
-	linearFactor := (x+1*y);
-	homogenVariable := y;
-	homogenCoord := Hurwitz@FR.Internal.HomogenCoordinates(linearFactor,y);
-	Assert(0, homogenCoord=[One(GF(121)),One(GF(121)) ]);
-	
-end
-);
-
-# normalize critical values (map first three to (infinity, 0, 1)
-# problem: wont work for complex critical values. 
-#Hurwitz@FR.Internal.NormalizeCriticalValues :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "NormalizeCriticalValues", 
-function( criticalValues, finiteField )
-	local criticalValuesHom, mat, criticalValuesHomTrans, criticalValuesTrans, i;
-	
-	criticalValuesHom := Hurwitz@FR.Internal.HomogenizeValues( criticalValues,finiteField );
-	mat := Hurwitz@FR.Internal.ComputeCVNormalizationMap( criticalValuesHom );	
-	criticalValuesHomTrans := List( criticalValuesHom,x->mat*x );
-	criticalValuesTrans := Hurwitz@FR.Internal.DehomogenizeValues( criticalValuesHomTrans );
-    	return criticalValuesTrans;
-end
-);
-
-
-
-#Hurwitz@FR.Internal.FindHurwitzMapModPrime :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "FindHurwitzMapModPrime", 
-function( field, partitions, criticalValues,  strictNormalization, onlyComputeSearchSpaceSize, ignoreHurwitzFormula )
-    local convayPolynomial, flags, input, output, degree, i, mat, p, poly, rat, f,
-          criticalValuesHom, criticalValuesHomTrans, polynomials,postError;
-
-    postError := "\nArguments should be '<field>, <partitions>, <critical values>, <strictNormalization>, <onlyComputeSearchSpaceSize>' ";    
-    if not IsDuplicateFree(criticalValues) then Error(Concatenation("critical values not distinct!",postError ) );  fi;
-    if not strictNormalization in [true,false] then  Error(Concatenation("strictNormalization not a boolean!",postError ));   fi;
-    if not onlyComputeSearchSpaceSize in [true,false] then  Error(Concatenation("onlyComputeSearchSpaceSize not a boolean!",postError ));   fi;
-    if not IsList(criticalValues)  and ForAll(criticalValues,x->x in field or x=infinity) then
-        Error(Concatenation("critical values expected to be a duplicate-free list of field elements ",postError ));
-    fi;     
-
-    while Length(criticalValues)<>Length(partitions) do
-        Error(Concatenation("Arrays <shapes> and <criticalValues> should have same length",postError ) );
-    od;
-    degree := Sum( partitions[1] );
-    Info(InfoFR,1, String(  List(partitions,x->Sum(x-1) ) ) );
-    if not ignoreHurwitzFormula then
-    while Sum(List(partitions,x->Sum(x-1)))<>2*degree-2 do
-        Error("Sum of local degrees does not add to 2*degree-2 = ",2*degree-2);
-    od;
-    fi;
-    input := "";
-   # f := OUTPUTTEXTSTRING@(input);
-    f :=   OutputTextString(input,false);
-    flags := 0;
-    if InfoLevel(InfoFR)>1 then
-        flags := flags+1;
-    fi;
-    if onlyComputeSearchSpaceSize then
-        flags := flags+2;
-    fi;
-     if strictNormalization then
-        flags := flags+4;
-    fi;
-    convayPolynomial := ConwayPolynomial( Characteristic(field),DegreeOverPrimeField(field) );
-    PrintTo(f, flags," ",
-            Characteristic(field)," ",
-            DegreeOverPrimeField(field),"\n",
-            JoinStringsWithSeparator( List(CoefficientsOfUnivariatePolynomial( convayPolynomial ),IntFFE )," "),"\n",
-            degree," ",
-            Length(criticalValues),"\n"
-            );
-    for i in partitions do
-        PrintTo(f,JoinStringsWithSeparator(i," ")," 0\n");
-    od;
-    criticalValuesHom := Hurwitz@FR.Internal.HomogenizeValues(criticalValues, field);    
-    mat := Hurwitz@FR.Internal.ComputeCVNormalizationMap(criticalValuesHom);
-  
-    criticalValuesHomTrans := List(criticalValuesHom,x->mat*x);
-    for i in [4..Length(criticalValuesHomTrans)] do
-        PrintTo( f, LogFFE( criticalValuesHomTrans[i][1]/criticalValuesHomTrans[i][2], PrimitiveElement(field) ) );
-         PrintTo( f, "  \n");
-    od;
-    CloseStream(f);
-    Info( InfoFR,2,"hurwitzMapSearch called with:\n", input );
-    output := "";
-    while HURWITZ_MAP_SEARCH_BIN@FR=fail do
-        Error("Could not find the executable hurwitzMapSearch. Did you compile it?");
-    od;
-   # i := Process(DirectoryCurrent(), HURWITZ_MAP_SEARCH_BIN@FR, InputTextString(input), OUTPUTTEXTSTRING@FR(output), []);
-    i := Process(DirectoryCurrent(), HURWITZ_MAP_SEARCH_BIN@FR, InputTextString(input), OutputTextString(output,false), []);
-    Info(InfoFR,2,"hurwitzMapSearch returned:\n",output);
-    while i<>0 do
-        Error("hurwitzMapSearch returned error code ",i,". Repent.");
-    od;
-    if onlyComputeSearchSpaceSize then
-        return EvalString(output);
-    fi;
-    poly := EvalString(output);
-   
-    for i in [1..Length(poly)] do
-        p := poly[i];
-
-        polynomials := List(p, polynomialCoeffs->UnivariatePolynomialByCoefficients( FamilyObj(One(field)), polynomialCoeffs ));
-             
-        rat := mat^-1*[p[2],p[1]];
-        poly[i] := [UnivariateRationalFunctionByCoefficients(FamilyObj(One(field)),rat[1],rat[2],0), polynomials ];
-    od;
-    return poly;
-end
-);
-
-
-InstallOtherMethod( FindHurwitzMapModPrime@FR, "", [ IsPrimeField, IsList, IsList, IsBool ],
-function( field, partitions, criticalValues, strictNormalization )
-	return Hurwitz@FR.Internal.FindHurwitzMapModPrime( field, partitions, criticalValues, strictNormalization, false, false );
-end
-);
-
-
-InstallOtherMethod( FindHurwitzMapModPrime@FR, "", [IsPrimeField, IsList, IsList ],
-function( field, perms, criticalValues )
-    local degree, partitions, postError;
-    
-    postError := "\nArguments should be '<field>, <permutations>, <critical values>' ";    
-        
-    while not ForAll(perms,IsPerm) do
-        Error(Concatenation("second parameter problem: should be a list of permutations", postError ));
-    od;
-    
-
-    while not IsList(criticalValues)  or 
-       not  ForAll(criticalValues,x->x in field or x=infinity) or 
-       not  IsDuplicateFree(criticalValues) 
-       do
-        Error(Concatenation("critical values expected to be a duplicate-free list of field elements ",postError ));
-    od; 
-        
-    while Length(criticalValues)<>Length(perms) do
-        Error(Concatenation("Fields <perms> and <criticalValues> should have same length",postError ) );
-    od;
-    
-    degree := Maximum(List( perms,LargestMovedPoint ));
-    partitions := List(perms, p->CycleLengths( p,[1..degree]) );
-    
-    while Sum( List(partitions,x->Sum(x-1)))<>2*degree-2 do
-        Error("Sum of local degrees does not add to 2*degree-2 = ",2*degree-2);
-    od;
-    return Hurwitz@FR.Internal.FindHurwitzMapModPrime( field, partitions, criticalValues, false ,false, false );
-end 
-);
- 
-  
-
-InstallMethod( HurwitzMapSearchSpaceSize@FR, "", [IsPrimeField, IsList, IsList, IsBool ],
-function( field, permsOrShapes, criticalValues, ignoreHurwitzFormula )
-   local degree, shapes;
-   
-   if IsPerm( permsOrShapes[1] ) then
-	    while Length(criticalValues)<>Length(permsOrShapes) do
-           		Error("Fields <perms> and <criticalValues> should have same length");
-	    od;
-	    if not ForAll( permsOrShapes, IsPerm ) then
-		    Error("second parameter is not a list of permutations!");
-	    fi;
-	
-	    degree := Maximum(List( permsOrShapes,LargestMovedPoint ));
-	    shapes := List(permsOrShapes, p->CycleLengths( p,[1..degree]) );
-	    while Sum( List(shapes,x->Sum(x-1)))<>2*degree-2 do
-		    Error("Sum of local degrees does not add to 2*degree-2 = ",2*degree-2);
-	    od; 
-	    return Hurwitz@FR.Internal.FindHurwitzMapModPrime( field, shapes, criticalValues,  false, true, ignoreHurwitzFormula );
-   else
-	    return Hurwitz@FR.Internal.FindHurwitzMapModPrime( field, permsOrShapes, criticalValues, false, true, ignoreHurwitzFormula ); 	
-   fi;
- end
- );
-
-
-InstallOtherMethod( HurwitzMapSearchSpaceSize@FR, "", [IsPrimeField, IsList, IsList ],
-function( field, permsOrShapes, criticalValues ) 
-    return HurwitzMapSearchSpaceSize@FR( field, permsOrShapes, criticalValues, false );
-end
-);
- 
-################################## TESTS FINITE SEARCH PART ###########################################
-
-# todo: more detailed internal test description (how it works)
-
-
-# restrictions: test probably not correct for extension fields ( e.g. line 'fam:=' ...
-#Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "CHECK_FINITE_FIELD_MAP",
-function( mapData, partitions, criticalValues, criticalValuesTrans, strictNormalization )
-	local  degree, polynomial, shape, i, polSetData, fam, rm, map, W1, W2, Wi, expected;
-	
-	degree := Sum( partitions[1] );
-	map := mapData[1];
-	polynomial := NumeratorOfRationalFunction( map ) ;
-	shape := ComputeShape@FR( polynomial, degree ); 
-	Assert(0, ComputeShape@FR(polynomial,degree ) = Shape@FR( partitions[2]) );
-
-	polynomial := DenominatorOfRationalFunction( map ) ;
-	Assert(0,  ComputeShape@FR(polynomial,degree )= Shape@FR( partitions[1] ) );
-	
-	polynomial := NumeratorOfRationalFunction( map-1 ) ;
-	Assert(0,  ComputeShape@FR(polynomial,degree ) = Shape@FR( partitions[3] ) );
-	
-	#check if normalization is correct
-	if strictNormalization then	
-		polynomial  :=  NumeratorOfRationalFunction( map );
-		rm := RootMultiplicity@FR(polynomial,  criticalValues[2],degree );
-		Assert(0, rm = partitions[2][1] ); # expected zero root with  multiplicity shapes[2][1](=1).
-		polynomial :=  DenominatorOfRationalFunction( map );
-		rm := RootMultiplicity@FR(polynomial, criticalValues[1] ,degree );
-		Assert(0, rm = partitions[1][1] ); # expected infinity root with  multiplicity shapes[1][1](=2).
-
-		polynomial  :=  NumeratorOfRationalFunction( map-1 );
-		rm := RootMultiplicity@FR(polynomial, criticalValues[3] ,degree );
-		Assert(0, rm = partitions[3][1] ); # expected one root with  multiplicity shapes[3][1](=3).
-		
-	fi;
-	polSetData := mapData[2];
-	
-	fam := FamilyObj( One( LeadingCoefficient(polynomial)^-1*LeadingCoefficient(polynomial) ));
-	W1 :=  polSetData[1] ;
-	W2 :=  polSetData[2] ;
-	
-	# check shapes and critical values.
-	for i in [3..Size(polSetData)] do
-		Wi  :=  polSetData[i] ;
-		Assert(0,  ComputeShape@FR(Wi,degree )= Shape@FR( partitions[i] ) );
-		
-		expected := W2 - criticalValuesTrans[i]*W1;
-		Assert(0, expected = Wi );
-	od;
-end
-);
-
-
-#test GAPRenormalization 
-#Hurwitz@FR.Tests.TEST_CRITICAL_VALUES_NORMALIZATION := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_CRITICAL_VALUES_NORMALIZATION",
-function()
-	local fieldSize, finiteField, criticalValues,criticalValuesTrans;
-	fieldSize := 7;
-	finiteField :=GF(fieldSize);	
-	criticalValues := [ 0*Z(fieldSize), Z(fieldSize)^1, Z(fieldSize)^6 ,infinity];
-	criticalValuesTrans:= Hurwitz@FR.Internal.NormalizeCriticalValues(criticalValues,finiteField);
-	Assert(0, criticalValuesTrans[1]=infinity);
-	Assert(0, criticalValuesTrans[2]=Zero(finiteField) );
-	Assert(0, criticalValuesTrans[3]=One(finiteField) );	
-end
-);
-
-
-# test search space size counting
-#Hurwitz@FR.Tests.TEST_COMPUTE_HURWITZ_MAP_SEARCH_SPACE_SIZE :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_COMPUTE_HURWITZ_MAP_SEARCH_SPACE_SIZE",
-function()
-	local fieldSize, finiteField, permutations,  criticalValues, partitions, searchSpaceSize;
-
-	fieldSize := 11;
-	finiteField:= Field( Z(fieldSize) );
-
-	criticalValues := [infinity, 0*Z(fieldSize),Z(fieldSize)^1];
-	
-
-	#HurwitzMapSearchSpaceSize@FR( finiteField, permutations, criticalValues);
-	
-	partitions := [[4,3,2,2,2],[4,3,2,2,2],[4,3,2,2,2]] ;
-	searchSpaceSize := HurwitzMapSearchSpaceSize@FR( finiteField,partitions, criticalValues);
-	Assert(0, searchSpaceSize = 112258800);
-end 
-);
-
-
-# test default configuration (three branch values, no strict normalization)
-#Hurwitz@FR.Tests.TEST_HMS_THREE_CRITICAL_VALUES:=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_HMS_THREE_CRITICAL_VALUES",
-function()
-	local fieldSize, finiteField, permutations, degree,
-	      partitions,  criticalValues,criticalValuesTrans, countonly, maps, mapData;
-	
-	fieldSize := 11;
-	finiteField := GF(fieldSize);
-	permutations := [(1,2),(2,3),(1,2,3)];
-	degree := Maximum(List(permutations,LargestMovedPoint));
-	partitions := List(permutations,p->CycleLengths(p,[1..degree]));
-	criticalValues := [ infinity, 0*Z(fieldSize), Z(fieldSize)^0 ];
-	
-	
-	maps := FindHurwitzMapModPrime@FR( finiteField ,permutations,criticalValues );
-	criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );
-	mapData := maps[1] ;
-	Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP(  mapData, partitions, criticalValues,criticalValuesTrans, false );
-	
-	maps:=[];
-	criticalValues := [ 0*Z(fieldSize), infinity, Z(fieldSize)^0 ];
-	maps := FindHurwitzMapModPrime@FR( finiteField, permutations ,criticalValues );
-	criticalValuesTrans:= Hurwitz@FR.Internal.NormalizeCriticalValues(criticalValues,finiteField);
-	
-	mapData := maps[1] ;
-	Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP( mapData, partitions, criticalValues,criticalValuesTrans, false );
-	
-	# kept an example for CoefficientsOfUnivariatePolynomial and IntFFESymm usage:
-	# List( last, p->List( CoefficientsOfUnivariatePolynomial(p), IntFFESymm) );
-end 
-);
-
-
-# test strict normalization
-#Hurwitz@FR.Tests.TEST_HMS_STRICT_NORMALIZATION := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_HMS_STRICT_NORMALIZATION",
-function()
-	local fieldSize, finiteField, permutations, degree, partitions,
-	      criticalValues, criticalValuesTrans, strictNormalization, maps;
-	
-	fieldSize := 11;
-	finiteField := GF(fieldSize);
-	permutations := [(1,2),(2,3),(1,2,3)];
-	Assert(0, Product(permutations)=() );
-	degree := Maximum( List(permutations,LargestMovedPoint) );
-	partitions := List(permutations,p->CycleLengths(p,[1..degree]));
-	partitions := [ [2,1], [1,2], [3] ];
-	criticalValues := [  infinity, 0*Z(fieldSize), Z(fieldSize)^0 ];
-	
-	strictNormalization := true;
-	
-	maps := FindHurwitzMapModPrime@FR( finiteField, partitions ,criticalValues,  strictNormalization );
-	Assert( 0, Size(maps)=1 );
-	criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues(criticalValues,finiteField);
-	Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP(  maps[1], partitions, criticalValues,criticalValuesTrans, strictNormalization );
-end 
-);
-
-
-# test more than 3 critical values; default normalization
-#Hurwitz@FR.Tests.TEST_HMS_FOUR_CRITICAL_VALUES :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_HMS_FOUR_CRITICAL_VALUES",
-function()
-	local fieldSize, finiteField, permutations, degree, partitions,  
-	      criticalValues,criticalValuesTrans, strictNormalization, maps;
-	
-	fieldSize := 7; # 
-	finiteField :=GF(fieldSize);	 
-	partitions := [ [2,1],[2,1],[2,1],[2,1] ]; 
-	criticalValues := [infinity, 0*Z(fieldSize), Z(fieldSize)^0, Z(fieldSize)^5 ];
-	
-	strictNormalization := false;
-	
-	maps  := FindHurwitzMapModPrime@FR( finiteField, partitions, criticalValues, strictNormalization );
-	Assert(0, Size(maps)=1);
-	criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField);
-	Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP(  maps[1], partitions, criticalValues, criticalValuesTrans, strictNormalization );
-end 
-);
-
-
-# test more than 3 critical values, different normalization.
-#Hurwitz@FR.Tests.TEST_HMS_UNCOMMON_CRITICAL_VALUES :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_HMS_UNCOMMON_CRITICAL_VALUES",
-function()
-	local fieldSize, finiteField, permutations, degree, partitions,  criticalValues, criticalValuesTrans,countonly,  strictNormalization, maps;
-	
-	fieldSize := 7; # todo : check in M2: recently no results for char 7 
-	finiteField :=GF(fieldSize);	 
-	partitions := [ [2,1],[2,1],[2,1],[2,1] ]; 
-	criticalValues := [infinity, 0*Z(fieldSize), Z(fieldSize)^1, Z(fieldSize)^6 ];
-	
-	strictNormalization := false;
-	
-	maps  := FindHurwitzMapModPrime@FR(finiteField,partitions,criticalValues,  strictNormalization);
-	Assert(0, Size(maps)=1);
-	criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues(criticalValues,finiteField);
-	Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP(  maps[1], partitions, criticalValues,criticalValuesTrans, strictNormalization );
-	
-	maps:=[];
-	criticalValues := [ 0*Z(fieldSize), infinity, Z(fieldSize)^0, Z(fieldSize)^1 ];
-	maps  := FindHurwitzMapModPrime@FR( finiteField,partitions, criticalValues,  strictNormalization);
-	Assert(0, Size(maps)=1);
-	criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );
-	Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP(  maps[1], partitions, criticalValues,criticalValuesTrans, strictNormalization );
-end 
-);
-
-
-############################### LIFT HURWITZ MAP ##############################################
-
-
-# computes factors alpha_i such that W[2]- alpha_i*polTuple[1]=polTuple[i+2] for i >=1;
-# if nut computable, returns Null@FR. # todo: what about to return fail instead of Null@FR?
-
-# todo: rename in according to the published paper...
-## todo: some code anywhere    could fail for Galois field if it looks at characteristic. 
-# Hurwitz@FR.Internal.ComputeAlphaFactors :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "ComputeAlphaFactors",
-function( polTuple , coeffField )
-    local alphaFactors, characteristic, pos, found, alpha, one;
-
-    # optional Assert hasInfinityRoot( polTuple[1] )   
-    
-    alphaFactors := [];
-
-    for pos in [3..Size(polTuple)] do
-        found := false;
-        for alpha in Elements(coeffField)  do  
-           
-            if polTuple[2]- alpha*polTuple[1]=polTuple[pos] then
-                found:=true;
-                break;
-            fi;
-        od;
-        if not found then
-            return fail;
-        fi;
-        Append(alphaFactors, [ alpha ] );
-    od;
-    return alphaFactors;
-end
-);
-
-
-#Hurwitz@FR.Tests.TEST_COMPUTE_ALPHA_FACTORS :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_COMPUTE_ALPHA_FACTORS",
-function()
-    
-    local field, rng, indeterminates, x, polTuple, alphaFactors;
-
-    field := GF(16);
-    rng := PolynomialRing( GF(16)  ,["x"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    polTuple := [ Z(16)*x^0, Z(16)^2*0, Z(16)^3*x^0 ];
-    
-    alphaFactors := Hurwitz@FR.Internal.ComputeAlphaFactors( polTuple , field );
-
-    Assert(0, not fail=alphaFactors);
-
-    Assert(0, CoefficientsFamily(FamilyObj(polTuple[1])) = ElementsFamily(FamilyObj(alphaFactors)) );   
-end
-);
-
-
-
-
-# return the number of required coefficient variables for polTuple in case there is no variable for the leading coefficient (polynomial assumed monic) .
-# precondition: each polynomial in polTuple is monic. (is checked by this function)
-#
-# todo: can be simplified by using the shape list and the information about normalized factors. 
-
-#Hurwitz@FR.Internal.RequiredCoeffUnknownNumber := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "RequiredCoeffUnknownNumber",
-function (polTuple, factorBasesToIgnore ) 
-    local numCoeffUnknowns, polynomial, prod, variable, factorBases, 
-    currPolynomial , srcMonomials, currCoefficients, byExponentSortedFactors, factor, factorsByExponentList;
-    
-    numCoeffUnknowns := 0;
-    for polynomial in polTuple do
-            prod :=  UNIQUE_PRODUCT@FR( polynomial );
-            Assert(0, IsOne(polynomial) or prod = REMOVE_CONSTANT_FACTORS@FR(prod) );
-            prod := REMOVE_CONSTANT_FACTORS@FR(prod);
-            byExponentSortedFactors := Reversed( SORT_POWERS_BY_EXPONENT@FR(prod) );
-            variable := IndeterminateOfUnivariateRationalFunction( polynomial );            
-            for factorsByExponentList  in byExponentSortedFactors  do
-                factorBases := [];
-                for factor in factorsByExponentList do
-                    if not factor[1] in factorBasesToIgnore then
-                        Append( factorBases, [ factor[1] ]  );
-                    fi;
-                od;
-                if Size(factorBases)>0 then
-                    currPolynomial := Product( factorBases ) ; 
-                    numCoeffUnknowns := numCoeffUnknowns + Degree(currPolynomial);
-        
-                    srcMonomials := List( [0..Degree(currPolynomial)-1], n->variable^n);
-                    currCoefficients := Coefficients@FR( currPolynomial, Reversed(srcMonomials)  );
-                    # check that currPolynomial always normalized. and there is no infiniteRoot-factor;
-                    Assert(0,  IsOne( MonomialCoefficient@FR(currPolynomial, variable^Degree(currPolynomial)) ) );
-                fi;
-            od;
-    od;
-    return numCoeffUnknowns;
-end
-);
- 
-
-#InstallGlobalFunction( CreateDefaultTestPolTuple@FR ,
-#Hurwitz@FR.Internal.CreateDefaultTestPolTuple :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "CreateDefaultTestPolTuple",
-function( coeffFieldRef )
-  local coeffField, rng, indeterminates, x, polTuple;
-
-    coeffFieldRef[1] := ZmodnZ(11);
-    rng := PolynomialRing( ZmodnZ(11)  ,["x"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    polTuple := [];
- 
-    Append( polTuple, [         (x-5)^3*(x^3 +3*x^2 +2*x +3)^2] );
-    Append( polTuple, [   (x)^4*(x+3)^3*(x^3        -3*x -5)^2 ] );
-    Append( polTuple, [ (x-1)^4*(x-3)^3*(x^3         -2*x-3)^2] );
-
-   return polTuple;
-end
-);
-
-
-#Hurwitz@FR.Tests.TEST_REQUIRED_COEFF_UNKNOWN_NUMBER:=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_REQUIRED_COEFF_UNKNOWN_NUMBER",
-function()
-    local   polTuple,factorsToIgnore,x, coeffFieldRef;
-
-    coeffFieldRef := [Null@FR];
-    polTuple:= Hurwitz@FR.Internal.CreateDefaultTestPolTuple(coeffFieldRef);
-    Assert(0, 14= Hurwitz@FR.Internal.RequiredCoeffUnknownNumber( polTuple, []) ); # 14, weil unendlich nicht dabei ist, sonst 15
-    x := IndeterminateOfUnivariateRationalFunction(polTuple[1] );
-    factorsToIgnore :=[ x-1, x ];
-    Assert(0, 12= Hurwitz@FR.Internal.RequiredCoeffUnknownNumber(polTuple,  factorsToIgnore) );
-end
-);
-
-
-InstallGlobalFunction( NormalizationRule@FR ,
-function( polynomialId, multiplicity, rootValue)
-
-    local normalizationRule;
-    Assert(0 , polynomialId=Null@FR or polynomialId in PositiveIntegers);
-    Assert(0 , multiplicity=Null@FR or multiplicity in PositiveIntegers);
-    
-    normalizationRule := rec();
-    normalizationRule. polynomialId := polynomialId;
-    normalizationRule. multiplicity := multiplicity;
-    normalizationRule. root := rootValue;
-    normalizationRule.dataType := "NormalizationRule";
-    return Immutable( normalizationRule );
-end
-);
-
-
-InstallGlobalFunction( IsNormalizationRule@FR ,
-function(normRule)
-
-    if not IsRecord(normRule) 
-	    or not "dataType"  in RecNames(normRule)
-	    or not normRule.dataType="NormalizationRule" 
-	    or not "polynomialId"  in RecNames(normRule)
-	    or not "multiplicity" in RecNames(normRule)
-	    or not "root" in RecNames(normRule)
-	    or (not normRule.polynomialId in PositiveIntegers and not normRule.polynomialId=Null@FR)
-	    or (not IsPosInt(normRule.multiplicity)  and not normRule.multiplicity=Null@FR)
-	    or not normRule = NormalizationRule@FR( normRule.polynomialId,  normRule.multiplicity, normRule. root) then
-		    return false;
-	fi;	
-	return true;
-end
-);
-
-
-
-# todo: check that normalization rule root values are pairwise distinct.
-# todo: eventually pass minpolynomials instead of criticalValues..
-# critical values: pairs of rationals approximating real and imaginary parts of critical values.
-InstallOtherMethod ( HurwitzMapSearchProblem@FR , "", [IsList, IsList, IsList],
-function( shapes, criticalValues, normalizationRules)
-    local  hmsProblem, i,j;
-
-    Assert( 0, ForAll( normalizationRules,IsNormalizationRule@FR ) );
-    Assert( 0, Size(shapes)>=3);
-    Assert( 0, Size( criticalValues)= Size(shapes) );
-
-    
-    Assert( 0, criticalValues[1][1] = infinity);
-    Assert( 0, criticalValues[1][2] = infinity);  
-    Assert( 0, IsOne(criticalValues[3][1]) );
-    Assert( 0, IsZero(criticalValues[3][2]) );
-    Assert( 0, IsZero(criticalValues[2][1]) );
-    Assert( 0, IsZero(criticalValues[2][2]) );
- 
-    
-    for i in [1..Size(normalizationRules)] do
-        if not normalizationRules[i].polynomialId=Null@FR and normalizationRules[i].polynomialId>Size( shapes ) then
-                Error("invalid polynomialId in normalization rules!");
-        fi;
-	    for j in [1..Size(normalizationRules)] do
-		    if  i<>j and normalizationRules[i].root = normalizationRules[j].root then 
-			        Error(" different normalization rules cannot have same root value!");
-	        fi;
-	    od;
-    od;
-
-    hmsProblem := rec();
-    hmsProblem.shapes := Immutable(shapes);
-    hmsProblem.criticalValues := Immutable(criticalValues);
-    hmsProblem.complexCriticalValues := Immutable( List( criticalValues, elem->Hurwitz@FR.Internal.RationalPairToComplex(elem) ));
-    hmsProblem.normalizationRules := Immutable( normalizationRules ) ;
-    hmsProblem.dataType := "HurwitzMapSearchProblem";
-    return Immutable(hmsProblem);
-end
-);
-
-
-# expect first critival values to be infinity, zero, one  and the following rational number approximations ( pairs of real and imaginary part rational approximations).
-InstallMethod( HurwitzMapSearchProblem@FR , "", [IsList, IsList, IsBool] ,
- function( partitions, criticalValues, strictNormalization)
-
-    local infinityNormRule, ZeroNormRule, OneNormRule, normalizationRules, shapes;
-   
-    Assert( 0, strictNormalization=true or strictNormalization=false);
-    if strictNormalization then
-        infinityNormRule := NormalizationRule@FR ( 1, partitions[1][1], infinity );
-        ZeroNormRule := NormalizationRule@FR ( 2, partitions[2][1], 0 );
-        OneNormRule := NormalizationRule@FR ( 3, partitions[3][1], 1);
-    else
-        infinityNormRule := NormalizationRule@FR ( 1, Null@FR, infinity );
-        ZeroNormRule := NormalizationRule@FR ( 2, Null@FR, 0 );
-        OneNormRule := NormalizationRule@FR ( 3, Null@FR, 1);
-    fi;
-    normalizationRules := Immutable( [infinityNormRule, ZeroNormRule, OneNormRule] );
-
-    shapes := List([1..Size(partitions)], i-> Shape@FR( partitions[i] ) );
- 
-    return Immutable(HurwitzMapSearchProblem@FR( shapes, criticalValues, normalizationRules ));
-end
-);
-
-
-InstallOtherMethod( HurwitzMapSearchProblem@FR , "", [IsList, IsList] ,
-function( permutations, criticalValues)
-   local mapDegree, partitions;
-    while not ForAll(permutations, IsPerm) do
-        Error("expected permutations as first parameter");
-    od;
-    mapDegree := Maximum(List(permutations,LargestMovedPoint));
-    partitions := List( permutations,p->CycleLengths(p,[1..mapDegree]) );
-    return  HurwitzMapSearchProblem@FR( partitions,criticalValues,false );
-end
-);
- 
-
-#Hurwitz@FR.Tests.TEST_CREATE_HURWITZ_MAP_SEARCH_PROBLEM := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_CREATE_HURWITZ_MAP_SEARCH_PROBLEM",
-function()
-    local hmsProblem;
-    hmsProblem :=  HurwitzMapSearchProblem@FR( [[4,3,2,2,2],[3,4,2,2,2],[3,2,4,2,2]], [ [infinity,infinity], [0,0], [1,0] ], true);
-    
-    Assert(0, hmsProblem.shapes = [ Shape@FR([ 4, 3, 2, 2, 2 ]), 
-                                    Shape@FR([ 4, 3, 2, 2, 2 ]),  Shape@FR([ 4, 3, 2, 2, 2 ])
-                                  ] );
-    Assert(0, hmsProblem.criticalValues =  [ [infinity,infinity], [0,0], [1,0] ] );
-
-    Assert(0, hmsProblem.normalizationRules[1] =  rec( dataType := "NormalizationRule", multiplicity := 4, polynomialId := 1, root := infinity ));
-    Assert(0, hmsProblem.normalizationRules[2] =  rec( dataType := "NormalizationRule", multiplicity := 3, polynomialId := 2, root := 0 ));
-    Assert(0, hmsProblem.normalizationRules[3] =  rec( dataType := "NormalizationRule", multiplicity := 3, polynomialId := 3, root := 1 ));
-end
-);
-
-
-
-InstallGlobalFunction( RationalMinPolyFromRootApprox@FR,
-function( criticalValueApprox , variable)
-
-    local aNumerator, aDenominator, bNumerator, bDenominator;
-    # criticalValueApprox = [a,b]; value is a+i*b;
-    
-
-
-    Assert( 0, Size(criticalValueApprox) =2);
-    
-   if ( criticalValueApprox[1]=infinity and criticalValueApprox[2]=infinity ) then 
-        return InfinityRootPolynomial@FR;
-   fi;
-       
-    Assert( 0, criticalValueApprox[1] in Rationals);    
-    Assert( 0, criticalValueApprox[2] in Rationals);    
-   
-    aNumerator   := NumeratorRat   (criticalValueApprox[1]);
-    aDenominator := DenominatorRat (criticalValueApprox[1]);
-
-    bNumerator   := NumeratorRat   (criticalValueApprox[2]);
-    bDenominator := DenominatorRat (criticalValueApprox[2]);
-
-    if IsZero( criticalValueApprox[2] ) then
-           return  aDenominator*variable - aNumerator;  
-    else 
-        # minimalPolynomial = ( variable-(a+i*b))*( variable-(a-i*b)) = variable²+a²+b²- 2*a*variable . Now kill denominators.
-        return bDenominator^2*aDenominator^2*variable^2 + bDenominator^2*aNumerator^2 + aDenominator^2*bNumerator^2 - 2*bDenominator^2*aDenominator*variable*aNumerator;
-    fi;
-end
-);
-
-
-#Hurwitz@FR.Tests.TEST_COMPUTE_MIN_POLY :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_COMPUTE_MIN_POLY",
-function()
-    local rng, ind, x,mp;
-
-    rng:=PolynomialRing(Rationals, ["x"]);
-    ind:=IndeterminatesOfPolynomialRing(rng);
-    x := ind[1];
-    mp := RationalMinPolyFromRootApprox@FR([0,-1],x);
-    Assert(0, mp=x^2+1);
-    mp := RationalMinPolyFromRootApprox@FR([0,-1/2],x);
-    Assert(0, mp= 4*x^2+1);
-
-    mp := RationalMinPolyFromRootApprox@FR([35/11,0],x);
-    Assert(0, mp= 11*x-35);
-end
-);
-
-
-# create an ideal term for one polynomial in the polSet by replacing polynomial factor coefficients by variables from coeffVariables.
-# does not introduce coefficient variables for normalized factors ( normalized factor bases listed in 'normalizedFactorBases' )
-
-# What happens is the following:
-#   coefficients of the polynomial irreducible factors are replaced by variables ( from unknownVariables)  except the leading coefficients.
-# the next free coefficientVariable is tracked by coeffVarIdxByRef.
-# for normalized factors (factors  (type: Power@FR ) which have a base which is mentioned in 'normalizedFactorBases' ) no coefficient variables will be introduced. 
-# polynomial assumed to be monic.  
-# todo: check if normalizedFactorBasesn are normalized!
-# todo: probably can be simplified by using the shape list and the normalized factor list /hashtable. 
-#Hurwitz@FR.Internal.CreateFactoredIdealTerm := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "CreateFactoredIdealTerm",
-function (polynomial, coeffVariableIterator, dstRing, commonVariable, normalizedFactorBases )
-
-    local currIdealTermProduct, currFactor, prod, byExponentSortedFactors, factorsByExponentList, factor, variable,
-    factorBases,  factorExponent, currPolynomial, currExponent, currPolynomialDegree,  coercedNormalizedFactorBase;
-    
-    currIdealTermProduct := [];
-    currFactor := Null@FR;
-    
-    prod :=  UNIQUE_PRODUCT@FR( polynomial );
-    Assert(0, IsOne(polynomial) or prod=REMOVE_CONSTANT_FACTORS@FR(prod) );
-    prod:=REMOVE_CONSTANT_FACTORS@FR(prod);
-    byExponentSortedFactors := SORT_POWERS_BY_EXPONENT@FR( prod );
-    byExponentSortedFactors := Reversed(byExponentSortedFactors);
-    
-    for factorsByExponentList  in byExponentSortedFactors  do
-        Assert(0, Size(factorsByExponentList)>0 );
-        factorExponent := factorsByExponentList[1][2]; # in case I introduce an objectified Power, it will be easy to get the Exponent.
-        
-        factorBases := [];
-        for factor in factorsByExponentList do
-
-            if not factor[1] in normalizedFactorBases then
-                # todo: Assert that gcd (factor[1], normalizedFactorBases[i]) for each i is constant!
-                Append( factorBases, [ factor[1] ]  );
-            else
-                # do not introduce coefficient variables for normalized factors:
-                coercedNormalizedFactorBase := CoercePolynomialTensor@FR( factor[1], dstRing);
-                Assert( 0 ,  IsOne( MonomialCoefficient@FR( coercedNormalizedFactorBase, commonVariable^Degree(coercedNormalizedFactorBase)) ) );
-                variable := IndeterminateOfUnivariateRationalFunction( factor[1] );
-                Assert( 0, IndeterminateNumber@FR( variable ) = IndeterminateNumber@FR(commonVariable) );  
-                Append( currIdealTermProduct, [ [ coercedNormalizedFactorBase, factorExponent ] ]  );
-            fi;
-        od;
-
-        currFactor := commonVariable^0;
-
-        if Size(factorBases)>0 then 
-    
-            currPolynomial := Product( factorBases ) ;
-            
-            currPolynomialDegree := Degree( currPolynomial );
-            Assert( 0, currPolynomialDegree>0 );
-            Assert(0,  IsOne( MonomialCoefficient@FR(currPolynomial, commonVariable^currPolynomialDegree ) ) );
-            currFactor := currFactor* commonVariable^currPolynomialDegree;
-            for currExponent in [1..currPolynomialDegree] do
-                currFactor := currFactor + NextIterator(coeffVariableIterator) *commonVariable^(currPolynomialDegree-currExponent);
-            od;
-            Append( currIdealTermProduct, [   [currFactor, factorExponent ] ]  );
-        fi;        
-   od;
-   return currIdealTermProduct;
-end
-);
-
-
-## todo: the ideal term could also be created by shapeList and the normalization rule!
-# also the point coordinates could be create during CREATE_FACTORED_IDEAL_TERM ?
-
-# todo: test unzureichend, aber  createIdealTerm jetzt vermutlich korrekt im Gegensatz zu früher...
-# test-Problem: kann ein Polynom  über einem iterativ definierten Polynomring  nicht faktorisieren
-#Hurwitz@FR.Tests.TEST_CREATE_FACTORED_IDEAL_TERM :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_CREATE_FACTORED_IDEAL_TERM",
-function()
-
-    local rng, x,y, indeterminates, polynomial, prod, normalizedPolynomial, dstRng,
-    prevIterWarnVal, postRng, postDstIndeterminates, dstIndeterminates, coeffVariables, 
-    commonVariable, coeffVariableIterator, idealTerm;
-
-    rng := PolynomialRing( ZmodnZ(11)  ,["x","y"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-     polynomial := (x^4-4)^3*(4*x^2+2);
-    #polynomial := (x^2-4)^2*(4*x+2);
-    prod :=  UNIQUE_PRODUCT@FR( polynomial );
-    prod := REMOVE_CONSTANT_FACTORS@FR(prod) ;
-    normalizedPolynomial := PRODUCT_VALUE@FR(prod);
-    UNIQUE_PRODUCT@FR( normalizedPolynomial );
-    UNIQUE_PRODUCT@FR( polynomial );
-   
-    dstRng := PolynomialRing( Integers , 14 );
-
-    prevIterWarnVal := ITER_POLY_WARN;
-    ITER_POLY_WARN:=false;
-        postRng := PolynomialRing( dstRng , 1 );
-    ITER_POLY_WARN := prevIterWarnVal;
-
-    postDstIndeterminates :=  IndeterminatesOfPolynomialRing(postRng);
-
-    dstIndeterminates :=  IndeterminatesOfPolynomialRing(dstRng);
-    coeffVariables := List([1..14], n->dstIndeterminates[n]);
-    commonVariable := postDstIndeterminates[1];
-    
-    coeffVariableIterator := Iterator(coeffVariables);
-
-    idealTerm := Hurwitz@FR.Internal.CreateFactoredIdealTerm( normalizedPolynomial, coeffVariableIterator, postRng,  commonVariable, []) ;
-
-    Assert(0, Degree( PRODUCT_VALUE@FR(idealTerm) )=14);
-
-    #Factors(idealTerm); does not work.  
-
-   coeffVariableIterator := Iterator(coeffVariables);
-
-    idealTerm := Hurwitz@FR.Internal.CreateFactoredIdealTerm( normalizedPolynomial, coeffVariableIterator, postRng, commonVariable, [x+Z(11)^8] ) ;
-
-    coeffVariableIterator := Iterator(coeffVariables);
-
-    idealTerm := Hurwitz@FR.Internal.CreateFactoredIdealTerm ( normalizedPolynomial, coeffVariableIterator, postRng, commonVariable, [] ) ;
-
-    Assert(0, Degree( PRODUCT_VALUE@FR(idealTerm) ) = 14);
-end
-);
-
-
-
-# precondition (is checked implicitly): only  poltuple with monic polynomials.
-# note: polTupleToIdealPointCoord and ideal construction have to be consistent /compatible.
-# requirement: pass coefficient field of the polynomials in the polynomial tuple
-# todo: rename to ReducedHurwitzMapToIdealPoint ? 
-#Hurwitz@FR.Internal.PolTupleToIdealPoint :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "PolTupleToIdealPoint",
-function( polTuple, coeffField, factorBasesToIgnore )
-    
-    local pointCoordinates, alphaFactors, pos, prod, byExponentSortedFactors, variable, 
-    factorsByExponentList, factor, factorBases, currPolynomial, srcMonomials, polynomial;
-
-     Assert( 0, IsList( polTuple));
-     Assert(0, ForAll( polTuple, IsUnivariatePolynomial) );
-     pointCoordinates := [];
-    
-     for polynomial in polTuple do        
-         prod :=  UNIQUE_PRODUCT@FR( polynomial );
-         Assert(0, IsOne(polynomial) or prod = REMOVE_CONSTANT_FACTORS@FR(prod) );
-         prod := REMOVE_CONSTANT_FACTORS@FR(prod);
-         byExponentSortedFactors := Reversed ( SORT_POWERS_BY_EXPONENT@FR(prod) );
-         variable := IndeterminateOfUnivariateRationalFunction( polynomial );
-        
-         for factorsByExponentList  in byExponentSortedFactors  do
-              factorBases := [ variable^0 ];
-                for factor in factorsByExponentList do
-                    if not factor[1] in factorBasesToIgnore then
-                        Append( factorBases, [ factor[1] ]  );
-                    fi;
-                od;
-                currPolynomial := Product( factorBases ) ; 
-                # check: currPolynomial always normalized. and there is no infiniteRoot factor (s); 
-                Assert(0,  IsOne( MonomialCoefficient@FR(currPolynomial, variable^Degree(currPolynomial)) ) ); 
-                      
-                srcMonomials := List( [0..Degree(currPolynomial)-1], n->variable^n);
-                Append( pointCoordinates,  Coefficients@FR( currPolynomial, Reversed(srcMonomials)  )
-                      );
-        od;
-    od;
-     
-    alphaFactors := Hurwitz@FR.Internal.ComputeAlphaFactors( polTuple, coeffField );
-    Assert(0, not  alphaFactors=fail );
-
-    Append( pointCoordinates, [ alphaFactors[1] ] );       
-    for pos in [2..Size(alphaFactors)] do
-        Append( pointCoordinates, [ alphaFactors[pos]*alphaFactors[1]^-1 ] ); 
-    od;
-
-    return pointCoordinates;
-end
-);
-
-
-# Hurwitz@FR.Tests.TEST_POLTUPLE_TO_IDEAL_POINT :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_POLTUPLE_TO_IDEAL_POINT",
-function()
-
-    local coeffFieldRef,   x, polTuple, alphaFactors, point, humanReadablePoint, factorBasesToIgnore;
- 
-    coeffFieldRef := [Null@FR];
-    polTuple:= Hurwitz@FR.Internal.CreateDefaultTestPolTuple(coeffFieldRef);
-
-    alphaFactors := Hurwitz@FR.Internal.ComputeAlphaFactors( polTuple , coeffFieldRef[1] );
-
-    point   := Hurwitz@FR.Internal.PolTupleToIdealPoint( polTuple, coeffFieldRef[1], [] );
-    humanReadablePoint :=  List( [1..Size(point)], n->Int( point[n]) ); 
-    Assert(0, Size(point)=15 );
-
-    Assert(0, humanReadablePoint = [ 6, 3, 2, 3, 0, 3, 0, 8, 6, 10, 8, 0, 9, 8, 7 ] );
-
-    x:=IndeterminateOfUnivariateRationalFunction( polTuple[1] );
-    factorBasesToIgnore :=[x, x-1 ]; # ignore ZeroRoot and 1-root factors. 
-    point := Hurwitz@FR.Internal.PolTupleToIdealPoint( polTuple, coeffFieldRef[1], factorBasesToIgnore );
-    humanReadablePoint := List([1..Size(point)], n->Int(point[n]) ); # human readable data
-
-     Assert(0, Size(point)=13 );
-    Assert(0, humanReadablePoint =[ 6, 3, 2, 3, 3, 0, 8, 6, 8, 0, 9, 8, 7 ]);
-end
-);
-
-
-# todo:  what happens, if the polynomialRing of hurwitzMapLifter.poltuple entries has more than one variable?
-# todo: problem due to the fact that 
-#Hurwitz@FR.Internal.PolsetExtractFactorByRoot := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "PolsetExtractFactorByRoot",
- function( hurwitzMapLifter, root )
-    local pos, pol, polFactors, factor, variable; 
-    
-    for pos in [1..Size(hurwitzMapLifter.polTuple)] do
-        pol := hurwitzMapLifter.polTuple[pos];
-        variable := IndeterminateOfUnivariateRationalFunction(pol);
-        # 1. factor pol
-        if root=infinity then
-            if Degree(pol) < hurwitzMapLifter.getMapDegree() then 
-                factor := CreatePower@FR( InfinityRootPolynomial@FR, hurwitzMapLifter.getMapDegree()-Degree(pol) );
-                return Immutable(rec( polynomialId := pos, factor := factor ));
-            fi;
-        else
-            polFactors := UNIQUE_PRODUCT@FR(pol);
-            for factor  in polFactors do
-                 if IsZero( Value( factor[1], [variable], [root] ) ) then
-                    
-                    return Immutable(rec( polynomialId := pos, factor :=  factor  ));
-                fi;
-            od;
-        fi;
-    od;    
-    return fail;
-end
-);
-
-
-# hide this function inside of PolSet? but then it is probably more difficult to test and to design...
-#Hurwitz@FR.Internal.PolSetIsNormalized := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "PolSetIsNormalized",
-function(hurwitzMapLifter)
-
-    local normRule, normFactor;
-
-    Assert(0, Size( hurwitzMapLifter.hmsProblem.normalizationRules) =3 );
-
-    for normRule in hurwitzMapLifter.hmsProblem.normalizationRules do
-
-        normFactor := Hurwitz@FR.Internal.PolsetExtractFactorByRoot(hurwitzMapLifter, normRule.root);
-        if  normFactor=fail then 
-            return false;
-        fi;
-        if  not normRule.polynomialId=Null@FR then
-            if not normFactor.polynomialId = normRule.polynomialId  then 
-                return false;
-            fi;
-        fi;
-        if  (normRule.multiplicity in PositiveIntegers) then
-            if not (normFactor.factor[2] = normRule.multiplicity)  then 
-                return false;
-            fi;
-        fi;
-    od;
-    return true;
-end
-);
-
-
-#todo: Rename polTuple to W?
-
-
-# only for a Hurwitz problem. 
-
-# createLiftInputData: 
-# from a given solution over a finite field for a Hurwitz map search
-# constructs a corresponding ideal and the solution point coordinates. 
-# The solution point represents the polSet data and is an element of the constructed ideal.
-# Polynomial factors with Zero, one and infinity-root are fixed thus the equation system is not underestimated,
-# and a jacobian at the solution point  is invertible.
-# 
-# todo: separate ideal creation into a separate function, because otherwise the function is too long...
-#
-# Hurwitz@FR.Internal.CreateLiftInputData :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "CreateLiftInputData",
-function(hurwitzMapLifter)
-
-    local i, numOfCoeffUnknowns, scalingVariableCount, scalingVariableNames, coeffVariableNames,
-    coeffRing, prevIterWarnVal, hmsRing,  commonVar, coeffVariablesIt, scalingVariablesIt,
-    SW_1, SW_2, SW_i, equations, currEquation, currScalingVar, idealGenerators  ;
-  
-    # essential: polSet is normalized and all factors are monic!
-    hurwitzMapLifter.removeConstantFactors();   
-    hurwitzMapLifter.normalizePolynomials();
-    hurwitzMapLifter.removeConstantFactors();   
-    Assert( 0, hurwitzMapLifter.polynomialsAreNormalized() );
-    
-    numOfCoeffUnknowns  := Hurwitz@FR.Internal.RequiredCoeffUnknownNumber( hurwitzMapLifter.polTuple , hurwitzMapLifter.normalizedFactorBases() );
-   
-    Assert( 0, not fail = Hurwitz@FR.Internal.ComputeAlphaFactors( hurwitzMapLifter.polTuple, hurwitzMapLifter.finiteField) );
-    
-    scalingVariableCount := Size( hurwitzMapLifter.polTuple ) -2;
-   
-    coeffVariableNames := List( [1..numOfCoeffUnknowns ],n->Concatenation("a_",String(n)) );
-    scalingVariableNames := List( [1..scalingVariableCount ],n->Concatenation("alpha_",String(n)) );
-     
-    coeffRing  := PolynomialRing( Integers, Concatenation( coeffVariableNames, scalingVariableNames)  );
-
-
-## Attention !! not threadsafe  (access to global variable) 
-    prevIterWarnVal := ITER_POLY_WARN;
-    ITER_POLY_WARN  := false;
-        hmsRing   := PolynomialRing( coeffRing, 1 );
-    ITER_POLY_WARN := prevIterWarnVal;
-    
-    hurwitzMapLifter.unknownRingIndeterminates := IndeterminatesOfPolynomialRing(coeffRing);
-
-    hurwitzMapLifter.coeffVariables := List( [1..numOfCoeffUnknowns], n->hurwitzMapLifter.unknownRingIndeterminates[n] ) ;
-    hurwitzMapLifter.scalingVariables := List( [numOfCoeffUnknowns+1..numOfCoeffUnknowns+scalingVariableCount], n->hurwitzMapLifter.unknownRingIndeterminates[n] ) ;  
-
-    commonVar := IndeterminatesOfPolynomialRing(hmsRing)[1];
-
-    #hurwitzMapLifter.idealFactorsTuple := List( [1..Size(hurwitzMapLifter.polTuple)] , n->Null@FR);
-    hurwitzMapLifter.idealFactorsTuple := List(  hurwitzMapLifter.polTuple , n->Null@FR);
-    
-
-##################### create equations:
-
-    coeffVariablesIt := Iterator( hurwitzMapLifter.coeffVariables );
-   for i in [1..Size(hurwitzMapLifter.polTuple)] do
-       hurwitzMapLifter.idealFactorsTuple[i] := Hurwitz@FR.Internal.CreateFactoredIdealTerm( hurwitzMapLifter.polTuple[i], 
-                                                                                   coeffVariablesIt, 
-                                                                                   hmsRing, 
-                                                                                   commonVar,  
-                                                                                   hurwitzMapLifter.normalizedFactorBases() 
-                                                                                 );
-   od;
-  
-    SW_1 :=  PRODUCT_VALUE@FR( hurwitzMapLifter.idealFactorsTuple[1] );
-    SW_2 :=  PRODUCT_VALUE@FR( hurwitzMapLifter.idealFactorsTuple[2] );
-
-    equations:= []; 
-
-    scalingVariablesIt := Iterator(hurwitzMapLifter.scalingVariables);
-    for i in [3..Size(hurwitzMapLifter.polTuple)] do
-    
-        SW_i := PRODUCT_VALUE@FR( hurwitzMapLifter.idealFactorsTuple[i] );
-        
-        currScalingVar := NextIterator(scalingVariablesIt);
-        if i>3 then                                                      
-            currEquation := SW_2 - ( hurwitzMapLifter.scalingVariables[1] )* currScalingVar *SW_1 - SW_i;
-        else
-            currEquation := SW_2 - currScalingVar * SW_1 - SW_i;
-        fi;
-       
-        Append( equations ,[ currEquation ] );
-    od;
-    
-##################### create problem ideal 
-    idealGenerators := FlattenList@FR ( List([1..Size(equations)], n-> Coefficients@FR( equations[n] ) ) );
-    
-    for i in [2..scalingVariableCount] do
-         currEquation := RationalMinPolyFromRootApprox@FR( hurwitzMapLifter.hmsProblem.criticalValues[2+i], 
-                                                           hurwitzMapLifter.scalingVariables[i]
-                                                         );
-         Append( idealGenerators , [ currEquation ] ) ;
-    od;
-    
-    hurwitzMapLifter.ideal := Ideal ( coeffRing, idealGenerators );
-  
-    hurwitzMapLifter.unknownVariables := Concatenation( hurwitzMapLifter.coeffVariables, hurwitzMapLifter.scalingVariables  );
-
-##################### convert polTuple {W_i} to an ideal point.
-    hurwitzMapLifter.point := Hurwitz@FR.Internal.PolTupleToIdealPoint( hurwitzMapLifter.polTuple, hurwitzMapLifter.finiteField, hurwitzMapLifter.normalizedFactorBases()  );
-    hurwitzMapLifter.pointHumanReadable := List( [1..Size(hurwitzMapLifter.point)],n->Int(hurwitzMapLifter.point[n] ));
-    
-##################### check if ideal construction was consistent:
-
-    idealGenerators := GeneratorsOfTwoSidedIdeal( hurwitzMapLifter.ideal );        
-    Assert(0, IsZero( EvalPolynomialTensor@FR(idealGenerators, hurwitzMapLifter.unknownVariables, hurwitzMapLifter.point ) ) );
-    # does not work:    
-    # coercedRing  := PolynomialRing( hurwitzMapLifter.finiteField, Size( hurwitzMapLifter.unknownVariables ) );
-    # coercedGens := CoercePolynomialTensor@FR( idealGenerators, coercedRing );
-    # Assert(0, IsZero( EvalPolynomialTensor@FR(coercedGens, IndeterminatesOfPolynomialRing(coercedRing), hurwitzMapLifter.point ) ) );
-
-   return;
-
-end
-);
-
-
-
-# critical values: expect rational 
-#Hurwitz@FR.Internal.HurwitzMapData := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "HurwitzMapData",
-function( preimageLists, scalingConstants, complexCriticalValuesApprox, polRing ) 
-    # creates polynomials [A,B,C,...] from single rootData with  B-lambdaA = C, B-mueA = D, etc.
-    local createPolynomialList, createRationalMaps, hurwitzMapData, computeResiduesEx, computeMaxResidue;
-    
-    hurwitzMapData := rec();
-    
-    hurwitzMapData.preImageLists := preimageLists;
-    hurwitzMapData.scalingConstants := scalingConstants; # how to call?
-    
-    createPolynomialList := function ( preimageList, polynomialRing )
-	    local currentPolynomial,polynomialList, pos, ind, preimageData ;
-	    polynomialList := [];
-	     
-	    ind := IndeterminatesOfPolynomialRing(polynomialRing);
-	    for pos in [1..Size(preimageList)] do
-		    currentPolynomial := 1.0_c;
-		    for preimageData in preimageList[pos] do
-			    if (preimageData[1]<>infinity) then 
-				    currentPolynomial := currentPolynomial*( ( ind[1] - preimageData[1] )^preimageData[2] );
-			    fi;
-		    od;
-		    Append(polynomialList,[currentPolynomial]);
-	    od;
-	    return polynomialList; 
-    end;
-
- 
-
-    createRationalMaps := function ( preimages, scalingVals, polynomialRing )
-	    local polynomialList,rationalMapList, currPos,scalingFactor, num , denom ;
-	    polynomialList := createPolynomialList( preimages, polynomialRing ) ;
-	    rationalMapList := [];
-	    currPos := 3;
-	    for scalingFactor in scalingVals do
-		    num := polynomialList[2];
-		    denom := polynomialList[1]*scalingFactor;
-		    Append(rationalMapList,[ num/denom ]);
-		    #Append(rationalMapList,[ rec( numerator:=num , denominator:=denom ) ] );
-		    currPos := currPos+1;
-	    od;
-	    return rationalMapList;
-    end;
-   
-    hurwitzMapData.preimages := function(image)
-        if image=infinity then  
-            return hurwitzMapData.preImageLists[1];
-        fi;
-        
-        if IsZero(image) then  
-            return hurwitzMapData.preImageLists[2];
-        fi;
-        
-        if IsOne(image) then  
-            return hurwitzMapData.preImageLists[3];
-        fi;
-        Error(Concatenation("no preimage of ",String(image)," is known !"));
-    end;
-    
-     computeResiduesEx := function(map, indeterminates, preimages)
-          local residue, residues, point, points;
-          residues :=[];
-          points := List( preimages, preimage-> [preimage[1]] );
-          if not fail=Position(points, [infinity]) then
-             Remove(points, Position(points, [infinity]) );
-          fi;
-          for point in points do
-            residue := AbsoluteValue(  Value( map, indeterminates, point ) );
-            Append(residues, [ residue ] );
-          od;
-          return residues;
-     end;
-     
-     hurwitzMapData.approxHurwitzMapData := createRationalMaps( preimageLists, scalingConstants, polRing);
-     hurwitzMapData.polynomialRing := polRing;
-     hurwitzMapData.indeterminate :=  IndeterminatesOfPolynomialRing(polRing)[1];
-     hurwitzMapData.map := hurwitzMapData.approxHurwitzMapData[1];
-    
-     hurwitzMapData.computeResidues := function()
-        local preimage, residues, residue, idx, map;
-        residues:=[];
-     
-        Append(residues, computeResiduesEx( DenominatorOfRationalFunction(hurwitzMapData.map), 
-                                            [hurwitzMapData.indeterminate], hurwitzMapData.preimages(infinity) ) );
-     
-        
-        Append(residues, computeResiduesEx( NumeratorOfRationalFunction(hurwitzMapData.map), 
-                                            [hurwitzMapData.indeterminate], hurwitzMapData.preimages(0) ) );
-                                             
-                                                                                     
-        for idx in  [1..Size( hurwitzMapData.approxHurwitzMapData)] do
-             map :=  hurwitzMapData.approxHurwitzMapData[idx];
-             Append(residues, computeResiduesEx(  map - complexCriticalValuesApprox[idx+2], 
-                                            [hurwitzMapData.indeterminate], hurwitzMapData.preImageLists[idx+2] ) );
-        od;    
-                                                                                          
-	    return residues;
-	 end;
-	 	 
-   
-	 hurwitzMapData.maxResidue := Maximum(  hurwitzMapData.computeResidues() );
-	
-     return Immutable(hurwitzMapData);
-end
-);
-
-
-#Hurwitz@FR.Internal.ApproxIdealPointsToHurwitzMapRoots := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "ApproxIdealPointsToHurwitzMapRoots",
-function  (hurwitzMapLifter, approxIdealElementsData, opts, includeNormalizedRoots)
-    
-    local approxRationalMapRootData, approxIdealPoint, rationalMapFactorRoots, 
-          pol, rationalMapRootPart, sortedFactors, factorsByExponentList,
-         factorExponent, factor, polId, tmpRoots, tmpRoot, factorVal, unknownIdx, dstFam, 
-         firstScalar, scalar, scalingValueList, scalingVarIdx, approxHurwitzMapData;
-    
-    Assert(0, hurwitzMapLifter.polynomialsAreNormalized() );
-
-    Assert(0, "unknownVariables" in RecNames(hurwitzMapLifter));
-    Assert(0, "scalingVariables" in RecNames(hurwitzMapLifter));
-    Assert(0, "idealFactorsTuple" in RecNames(hurwitzMapLifter));
-    Assert(0, "unknownRingIndeterminates" in RecNames(hurwitzMapLifter));
-
-    Assert(0, "approxIdealElems" in RecNames(approxIdealElementsData) );
-
-    Assert( 0, Size(approxIdealElementsData.approxIdealElems)>0);
-    Assert( 0, Size(hurwitzMapLifter.unknownVariables)>0);
-    Assert( 0, Size(hurwitzMapLifter.scalingVariables)>0);
-   
-
-    approxRationalMapRootData := [];
-
-    for approxIdealPoint in approxIdealElementsData.approxIdealElems do
-        rationalMapFactorRoots := [];
-        for polId in [1..Size( hurwitzMapLifter.polTuple)] do 
-
-            pol:= hurwitzMapLifter.polTuple[polId];
-            rationalMapRootPart := [] ;
-
-              if  Degree(pol) < hurwitzMapLifter.getMapDegree() and includeNormalizedRoots then
-                  Append( rationalMapRootPart, [ [infinity, hurwitzMapLifter.getMapDegree()-Degree(pol)  ] ] );
-              fi;
-    
-            sortedFactors := SORT_POWERS_BY_EXPONENT@FR(hurwitzMapLifter.idealFactorsTuple[polId]);
-            sortedFactors := Reversed(sortedFactors);
-             for factorsByExponentList  in sortedFactors  do
-                Assert(0, Size(factorsByExponentList)>0 );
-                factorExponent := factorsByExponentList[1][2];
-
-                 for factor in factorsByExponentList do
-                        if factor[1] in hurwitzMapLifter.normalizedFactorBases() and includeNormalizedRoots then
-                            tmpRoots := opts.rootCalculator().computeRoots( factor[1]  );
-                            Assert(0, Size(tmpRoots)=1);
-                            for tmpRoot in tmpRoots do
-                                Append( rationalMapRootPart, [[tmpRoot, factorExponent ]] );
-                            od;
-                        else
-                                 # hack : 
-                                 dstFam := opts.rootCalculator().getDstPolynomialFam();
-                                 factorVal := SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR (factor[1],  hurwitzMapLifter.unknownRingIndeterminates, approxIdealPoint , dstFam );
-
-                                 # factorVal := Value (factor[1],  hurwitzMapLifter.unknownRingIndeterminates, approxIdealPoint );
-
-                                tmpRoots := opts.rootCalculator().computeRoots( factorVal );
-                                for tmpRoot in tmpRoots do
-                                    Append( rationalMapRootPart, [ [tmpRoot, factorExponent ] ] );
-                                od;
-                        fi;
-
-                od;
-              
-            od;
-            Append( rationalMapFactorRoots , [ rationalMapRootPart ] );
-        od;
-
-        scalingValueList:= [] ;
-       
-        unknownIdx := Position( hurwitzMapLifter.unknownRingIndeterminates, hurwitzMapLifter.scalingVariables[1] );
-        firstScalar := approxIdealPoint[ unknownIdx ];
-
-        Append  ( scalingValueList, [firstScalar] );
-
-        for scalingVarIdx in [2..Size( hurwitzMapLifter.scalingVariables)] do
-            unknownIdx :=  Position(hurwitzMapLifter.unknownRingIndeterminates, hurwitzMapLifter.scalingVariables[scalingVarIdx] );
-            scalar  := firstScalar*approxIdealPoint[unknownIdx];
-           Append  ( scalingValueList, [firstScalar] );
-        od;
-
-        approxHurwitzMapData  := Hurwitz@FR.Internal.HurwitzMapData( rationalMapFactorRoots, 
-                                                                      scalingValueList,
-                                                                      hurwitzMapLifter.hmsProblem.complexCriticalValues,    
-                                                                      opts.rootCalculator().getPolynomialRing() 
-                                                                    );
-                                                                      
-        Append( approxRationalMapRootData , [ approxHurwitzMapData ] );
-    od;
-    return approxRationalMapRootData;
-end
-);
-
-
-# poltuple: list over polynomials over a finite field  such that polTuple[i]= polTuple[2]-alpha_(i-2) polTuple[1] for some alpha_i<>0. and i>=3.
-# finite field parameter: coefficient field of the polTuple-polynomials - don't know yet how to extract it from the polTuple itself.
-
-# todo: objectify or not ?
-# rename PolSet to HurwitzMapCandidate or similar ? 
-InstallGlobalFunction( HurwitzMapLifter@FR ,
-function(polTuple, finiteField, hmsProblem)
-    local mapLifter, tupleMatchesShapes, polynomialsHaveCommonDivisors,computeApproxIdealPoints ; 
-
-    mapLifter := rec();
-
-    mapLifter.polTuple := polTuple;
-    
-    # todo: how to make it immutable? Properties/Attributes? - need to hide some data and make the polSet itself immutable...
-
-    mapLifter.getMapDegree := function()
-       local degrees;
-        degrees := List( [1..Size(mapLifter.polTuple)], n->Degree( mapLifter.polTuple[n] ) );
-        return Maximum( degrees );
-    end;
-    
-  
-    
-    # check if polTuple matches the shape by hmsProblem.
-      tupleMatchesShapes := function(tuple)
-        local degree, i;
-        degree := Maximum( List( [1..Size(tuple)], i-> Degree(tuple[i]) )) ;
-        for i in [1..Size(tuple)] do
-            if not  ComputeShape@FR( tuple[i], degree )=  hmsProblem.shapes[i] then
-                return false;
-            fi;
-        od;
-        return true;
-    end;
-    mapLifter.tupleMatchesShapes:=tupleMatchesShapes;
-    
-     # check  if  polynomials in polTuplePar have common divisors.
-     polynomialsHaveCommonDivisors := function(polTuplePar)
-       local i,j ;
-        for i in [1..Size(polTuplePar)] do
-        for j in [1..Size(polTuplePar)] do
-            if (i<>j) then 
-                if not Degree( Gcd( polTuplePar[i], polTuplePar[j] ))<1 then 
-                    #Error("polynomials have common divisors!");
-                    return true;
-                fi;
-            fi;
-        od;
-        od;
-        return false;
-      end;
-    
-    
-    mapLifter.isConsistent := function()
-       local i,j ;
-       
-       if polynomialsHaveCommonDivisors( mapLifter.polTuple ) then
-          #Error("polynomials have common divisors!");
-          return false;
-       fi;
-    
-        if not  tupleMatchesShapes( mapLifter.polTuple ) then 
-            return false;
-        fi;
-        
-        return true;
-    end;
-    
-    
-    if not mapLifter.isConsistent() then
-            Error("polynomials do not match problem (different multiplicity structure or polynomials have common divisors )");
-    fi;
-                
-
-     
-    mapLifter.finiteField:= finiteField;
-    mapLifter.hmsProblem := hmsProblem;
-
-   
-    #mapLifter.extractFactorByRoot := function(root)
-    #    return Hurwitz@FR.Internal.PolsetExtractFactorByRoot(mapLifter, root);
-    #end;
-    
-    
-    
-    mapLifter.removeConstantFactors := function()
-         local i, prod, indeterminate;
-         indeterminate := IndeterminateOfUnivariateRationalFunction( mapLifter.polTuple[1] );
-         for i in [1..Size(mapLifter.polTuple)] do 
-            prod := UNIQUE_PRODUCT@FR( mapLifter.polTuple[i]);
-            prod := REMOVE_CONSTANT_FACTORS@FR( prod );
-            mapLifter.polTuple[i] := PRODUCT_VALUE@FR( prod )*indeterminate^0;
-        od;
-    end;
-    
-    mapLifter.normalizePolynomials := function()
-
-         mapLifter.polTuple := NormalizePolynomialTuple@Hurwitz@FR( mapLifter.polTuple, hmsProblem);
-    end;
-       
-
-    # check for zero, one and infinity-root. they should conform with the normalizationRules in hmsProblem.
-    # also checks, if multplicity structure matches. (tupleMatchesShapes) 
-    mapLifter.polynomialsAreNormalized := function()
-        return Hurwitz@FR.Internal.PolSetIsNormalized( mapLifter );
-    end;
-    
-   
-   # mapLifter.createLiftInputData :=function()
-   #    Hurwitz@FR.Internal.CreateLiftInputData(mapLifter);
-   # end;
-    
-    # get a list of factors which matches normalizing rules (hmsProblem.normalizationRules)
-    # return value: a list of  " [ polynomialId, [ rootFactorBase, rootFactorExponent ] ] ";
-    mapLifter.normalizedFactors := function()
-        local rootList, rootFactorData;
-        Assert(0,  mapLifter.polynomialsAreNormalized() );
-        
-        rootList := List( mapLifter.hmsProblem.normalizationRules, rule->rule.root );
-        
-        if Position( rootList,infinity )<>fail then
-            Remove( rootList, Position( rootList,infinity)  );
-        fi;
-        
-        # rootfactor data type:  " [ polynomialId, [ rootFactorBase, rootFactorExponent ] ] ";
-        rootFactorData := List (rootList, root-> Hurwitz@FR.Internal.PolsetExtractFactorByRoot( mapLifter, CoerceScalar@FR( root,  mapLifter.finiteField ) )    );
-        Assert(0, true= ForAll(rootFactorData, function(factordata) return factordata<>fail; end) );
-
-        return rootFactorData;
-    end;
-    
-
-    mapLifter.normalizedFactorBases := function()
-        return List( mapLifter.normalizedFactors(), factorData-> factorData.factor[1] );
-    end;
-    
-    
-    #mapLifter.computeApproxIdealPoints := function( liftOptions )
-    
-    computeApproxIdealPoints := function( liftOptions )
-        local approxIdealElementsData;
-       
-        #Hurwitz@FR.Internal.CreateLiftInputData( mapLifter );
-        approxIdealElementsData := @PadicLift.ComputeApproxIdealPoints ( mapLifter.ideal, mapLifter.point , liftOptions );
-        #mapLifter.approxIdealElementsData := approxIdealElementsData;
-        return approxIdealElementsData;
-    end;
-
-    
-      mapLifter.computeApproxHurwitzMapsOptimized := function( liftOptions )
-         local approxIdealElementsData, liftedMapData;
-            approxIdealElementsData := COMPUTE_APPROX_HURWITZ_IDEAL_POINTS@FR( mapLifter.ideal, mapLifter.point , liftOptions );
-          
-            liftedMapData := Hurwitz@FR.Internal.ApproxIdealPointsToHurwitzMapRoots( mapLifter, approxIdealElementsData, liftOptions, true );
-            return liftedMapData;
-       end;
-    
-   mapLifter.computeApproxHurwitzMaps := function( liftOptions )
-         local approxIdealElementsData, liftedMapData;
-    
-            #mapLifterCopy :=  ShallowCopy ( mapLifter );
-            #mapLifterCopy :=    mapLifter ;
-            
-            #Hurwitz@FR.Internal.CreateLiftInputData( mapLifter );
-            approxIdealElementsData := @PadicLift.ComputeApproxIdealPoints ( mapLifter.ideal, mapLifter.point , liftOptions );
-            #mapLifter.approxIdealElementsData := approxIdealElementsData;
-            liftedMapData := Hurwitz@FR.Internal.ApproxIdealPointsToHurwitzMapRoots( mapLifter, approxIdealElementsData, liftOptions, true );
-            #mapLifter.liftedMapData := liftedMapData;
-            return liftedMapData;
-       end;
-       
-    
-    # 1. now make immutable? ShallowCopy trick?
-    # 2. normalize should be only an internal function ? 
-    mapLifter.removeConstantFactors();
-    mapLifter.normalizePolynomials();   
-    Hurwitz@FR.Internal.CreateLiftInputData( mapLifter );
-    
-    MakeImmutable(mapLifter);
-    
-    return mapLifter;
-end
-);
-
-
-
-
-InstallGlobalFunction( ApproxComplexHurwitzMaps@FR ,
-function ( hmsProblem,  polynomialTuple, finiteField, liftOptions )
-
-    local  hurwitzMapLifter;
-    
-    hurwitzMapLifter := HurwitzMapLifter@FR( polynomialTuple, finiteField, hmsProblem);
-    
-    return hurwitzMapLifter.computeApproxHurwitzMaps( liftOptions );        
-end
-);
-
-
-
-#Hurwitz@FR.Tests.TEST_APPROX_HURWITZ_MAPS :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_APPROX_HURWITZ_MAPS",
-function()
-    local fieldSize, finiteField, permutations, degree, partitions, preimage, mapDegree, map,z,
-        complexCriticalValueRationalApprox, reducedCriticalValues, mapsModPrime, maxDegree,           
-          polynomialTuple, hurwitzMapSearchProblem, strictNormalization, liftOptions, hurwitzMapCandidates;
-          
-    fieldSize := 11;
-	finiteField := GF(fieldSize);
-    permutations := [(1,2,3),(1,2),(2,3)];
-	
-	mapDegree := Maximum(List(permutations,LargestMovedPoint));
-	# partitions := List( permutations,p->CycleLengths(p,[1..mapDegree]) );
-    partitions := [ [ 3 ], [ 2, 1 ], [ 2, 1 ] ];
-	
-	complexCriticalValueRationalApprox := [ [infinity,infinity], [0,0], [1,0] ];
-	
-	reducedCriticalValues := [ infinity, 0*Z(fieldSize), Z(fieldSize)^0 ];
-
-	strictNormalization := true;
-		
-	mapsModPrime := FindHurwitzMapModPrime@FR( finiteField  ,partitions, reducedCriticalValues , strictNormalization);
- 
-	liftOptions := @PadicLift.LiftOptions();
-	liftOptions.setDecimalPrecision(24);
-	
-    hurwitzMapSearchProblem := HurwitzMapSearchProblem@FR( partitions , complexCriticalValueRationalApprox, strictNormalization);
-	hurwitzMapCandidates := ApproxComplexHurwitzMaps@FR( hurwitzMapSearchProblem, mapsModPrime[1][2], finiteField, liftOptions);
-	
-	Assert(0, ForAll(hurwitzMapCandidates, function(mapCandidate) return mapCandidate.maxResidue < 1.0e-15; end) );
-	
-    z := hurwitzMapCandidates[1].indeterminate;
-    Assert(0, Degree( (3.0_c*z^2+(-2.0_c*z^3)) /hurwitzMapCandidates[1].map ) =0);
-end
-);
-
-
-#Hurwitz@FR.Tests.TEST_APPROX_HURWITZ_MAPS_FOUR_CV :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_APPROX_HURWITZ_MAPS_FOUR_CV",
-function()
-    local finiteField,   partitions,  mapsModPrime, mapDegree,
-          hurwitzMapSearchProblem, strictNormalization, liftOptions, hurwitzMapCandidates, mapModPrime,
-          currentHurwitzMapCandidates,  approxBranchValues, reducedCriticalValues, reducedCritivalValueLists,
-          approxMapCandidatesCount;
-    
-
-    hurwitzMapCandidates := []; # variable for result  
-    
-	finiteField := GF(13); 	mapDegree := 3;
-	partitions := [ [1,2], [2,1], [2,1], [2,1] ];
-	approxBranchValues := [ [infinity,infinity], [0,0], [1,0], [0/1, -1/2] ]; 	
-	
-	# reduce critical values to finite field. TODO: pass minimal polynomials to c++ binary instead CV to avoid redundant computation.
-	reducedCritivalValueLists := Hurwitz@FR.ReduceCriticalValuesApprox( approxBranchValues, finiteField );
-    strictNormalization := true;    	
-	
-    for reducedCriticalValues in reducedCritivalValueLists do           
-
-        mapsModPrime := FindHurwitzMapModPrime@FR( finiteField  ,partitions, reducedCriticalValues, strictNormalization );
-        
-        if Size(mapsModPrime)>0 then 
-            liftOptions := @PadicLift.LiftOptions();
-            liftOptions.setDecimalPrecision(24);
-
-            for  mapModPrime  in mapsModPrime do 
-                hurwitzMapSearchProblem     := HurwitzMapSearchProblem@FR( partitions , approxBranchValues, strictNormalization );
-                currentHurwitzMapCandidates := ApproxComplexHurwitzMaps@FR( hurwitzMapSearchProblem, mapModPrime[2], finiteField, liftOptions);
-                Append( hurwitzMapCandidates, currentHurwitzMapCandidates);
-           od;
-        fi;
-   od;     
-   approxMapCandidatesCount := Number( hurwitzMapCandidates, function(mapCandidate) return mapCandidate.maxResidue < 1.0e-15; end);
-   Assert(0, approxMapCandidatesCount = 4 );	
-end
-);
-
-
-# Hurwitz@FR.Internal.CreateDefaultLifter :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Internal"], "CreateDefaultLifter",
-function()
- local coeffFieldRef,  polTuple, hmsProblem, polSet;
-
-    coeffFieldRef := [ Null@FR ];
-    polTuple :=   Hurwitz@FR.Internal.CreateDefaultTestPolTuple( coeffFieldRef );   
-
-    hmsProblem := HurwitzMapSearchProblem@FR( [[4,3,2,2,2], [3,4,2,2,2], [3,2,4,2,2]], 
-                                              [[infinity,infinity], [0,0], [1,0]], 
-                                              true);
-    polSet := HurwitzMapLifter@FR(polTuple, coeffFieldRef[1], hmsProblem);
-    return polSet;
-end
-);
-
-
-
-#Hurwitz@FR.Tests.TEST_CREATE_LIFTER :=
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_CREATE_LIFTER",
-function()
-
-    local hmsProblem, coeffFieldRef, rng, indeterminates, x, polTuple,  hurwitzMapLifter; 
-
-    hmsProblem := HurwitzMapSearchProblem@FR( [ [4,3,2,2,2], [3,4,2,2,2], [3,2,4,2,2] ], 
-                                              [[infinity,infinity], [0,0], [1,0]], 
-                                              true);
-
-    coeffFieldRef := [Null@FR];
-    hurwitzMapLifter := Hurwitz@FR.Internal.CreateDefaultTestPolTuple(coeffFieldRef);
-
-    hurwitzMapLifter := HurwitzMapLifter@FR( hurwitzMapLifter, coeffFieldRef[1], hmsProblem );
-
-end
-);
-
-
-#Hurwitz@FR.Tests.TEST_EXTRACT_FACTOR_BY_ROOT := 
-InstallGlobalRecordFunction@FR ( ["Hurwitz@FR","Tests"], "TEST_EXTRACT_FACTOR_BY_ROOT",
-function()
-    
-    local lifter, infinityFactor, zeroFactor, oneFactor, variable;
-
-    lifter := Hurwitz@FR.Internal.CreateDefaultLifter();
-
-    infinityFactor := Hurwitz@FR.Internal.PolsetExtractFactorByRoot(lifter, infinity);
-    zeroFactor := Hurwitz@FR.Internal.PolsetExtractFactorByRoot(lifter, 0);
-    oneFactor := Hurwitz@FR.Internal.PolsetExtractFactorByRoot(lifter, 1);    
-
-    Assert( 0, not infinityFactor=Null@FR );
-    Assert( 0, not zeroFactor=Null@FR );
-    Assert( 0, not oneFactor=Null@FR );
-
-    Assert( 0, infinityFactor.polynomialId = 1 );
-    Assert( 0, zeroFactor.polynomialId = 2 );
-    Assert( 0, oneFactor.polynomialId = 3);
-
-    variable := IndeterminateOfUnivariateRationalFunction( lifter.polTuple[1] );
-
-    Assert(0, IsZero( Value( lifter.polTuple[ zeroFactor.polynomialId],  [variable], [0])));
-    Assert(0, IsZero( Value( lifter.polTuple[ oneFactor.polynomialId],  [variable], [1])));
-    Assert(0, Degree( lifter.polTuple[ infinityFactor.polynomialId ])< lifter.getMapDegree() );
-
-    Assert( 0, IsZero( Value( zeroFactor.factor[1],  [variable], [0])) );
-    Assert( 0, IsZero( Value( oneFactor.factor[1],  [variable], [1])) );
-end
-);
-
-
-
-#Hurwitz@FR.Tests.TEST_CREATE_LIFT_INPUT_DATA :=
-InstallGlobalRecordFunction@FR (["Hurwitz@FR","Tests"], "TEST_CREATE_LIFT_INPUT_DATA",
-function()
-    local hurwitzMapLifter, coercedRing, gens, coercedGens, opts, jac, jacAt ;
-    
-     
-    hurwitzMapLifter := Hurwitz@FR.Internal.CreateDefaultLifter();
-    # Hurwitz@FR.Internal.CreateLiftInputData( hurwitzMapLifter ); data is now created implicitly
-       
-    gens := GeneratorsOfTwoSidedIdeal( hurwitzMapLifter.ideal );
-   
-     jac := Jacobian@FR( gens, hurwitzMapLifter.unknownVariables );
-     jacAt := EvalPolynomialTensor@FR( jac, hurwitzMapLifter.unknownVariables, hurwitzMapLifter.point );
-     Assert(0,  Rank (jacAt)=13 );
-     
-    # does not work: 
-    # coercedRing  := PolynomialRing( hurwitzMapLifter.finiteField, Size( hurwitzMapLifter.unknownVariables ) );
-    # coercedGens := CoerceTensor@FR(gens, coercedRing);
-    # jacAt := EvalPolynomialTensor@FR(jac, IndeterminatesOfPolynomialRing(coercedRing), hurwitzMapLifter.point );
-end
-);
- 
-
-
- 
-InstallGlobalRecordFunction@FR (["Hurwitz@FR"], "CreateTestString",
-function(prefix)
-    return @FR@Utils.Internal.CreateTestString("Hurwitz@FR.Tests", prefix);
-end
-);
-
-
-MakeImmutable( Hurwitz@FR.Tests );
-MakeImmutable( Hurwitz@FR.Internal );
-
-BindGlobal("@Hurwitz" ,Hurwitz@FR ) ;
-
-
-#E hurwitz.gi . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/gap/padicLift.gd b/sandbox/hurwitz.kroeker/gap/padicLift.gd
deleted file mode 100644
index 658a66e..0000000
--- a/sandbox/hurwitz.kroeker/gap/padicLift.gd
+++ /dev/null
@@ -1,247 +0,0 @@
-#############################################################################
-##
-#W p-adicLift                                                  Jakob Kröker
-##                                                               
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2012, Laurent Bartholdi
-##
-#############################################################################
-##
-##
-##
-##############################################################################
-
-
-# Dependencies: hurwitz/utils.g, package 'Float'
-#
-# todo: replace some more of the 'Asserts' with error messages
-
-
-
-######################################################## PUBLIC #############################################################
-#BindGlobal("@PadicLift" , rec() ) ;
-#DeclareGlobalFunction( "@PadicLift.");
-
-BindGlobal("@PadicLift" , rec() ) ;
-DeclareGlobalFunction( "@PadicLift.");
-@PadicLift.Tests    := rec();
-@PadicLift.Internal := rec();
-
-
-######### p-adic lift
-
-# lift a solution point mod prime to module prime^(2^numLiftDepth) (p-adic approximation)
-#Parameters: ( ideal,  solutionPoint , numLiftDepth)
-DeclareGlobalFunction( "PadicLift@FR" );
-@PadicLift.PadicLift := PadicLift@FR;
-DeclareGlobalFunction( "@PadicLift.PadicLift" );
-
-
-# given an ideal and its jacobian over integers/rationals, compute next padic approximation mod p^2k for for an solution mod p^k.
-# Parameters: ( ideal generators, jacobian, indeterminates, solutionApprox )
-DeclareGlobalFunction( "QuadraticLiftStep@FR" );
-@PadicLift.QuadraticLiftStep := QuadraticLiftStep@FR;
-DeclareGlobalFunction( "@PadicLift.QuadraticLiftStep" );
-
-# given an function to test if a point belongs to an ideal and a function which computes a jacobian for a given ideal point,
-# lifts a solution point mod prime to module prime^(2^numLiftDepth) (p-adic approximation)
-#Parameters: ( evaluateIdealGens, jacobianAt,  solutionPoint , numLiftDepth)
-DeclareGlobalFunction( "BlackBoxPadicLift@FR" );
-@PadicLift.BlackBoxPadicLift := BlackBoxPadicLift@FR;
-DeclareGlobalFunction( "@PadicLift.BlackBoxPadicLift" );
-
-
-# given an function to test if a point belongs to an ideal and a function which computes a jacobian for a given ideal point,
-# computes next padic approximation mod p^2k for for an solution mod p^k.
-# Parameters:  ( evalIdealGens, computeJacobianAt, solutionApprox )
-DeclareGlobalFunction( "BlackBoxQuadraticLiftStep@FR" );    
-@PadicLift.BlackBoxQuadraticLiftStep := BlackBoxQuadraticLiftStep@FR;
-DeclareGlobalFunction( "@PadicLift.BlackBoxQuadraticLiftStep" );
-
-
-######### compute minimal polynomials and approximate ideal points from given solution over a finite field.
-
-# given a finite field point of an ideal compute corresponding approximate ideal points over complex numbers.
-#
-# Parameters:   ideal (  generated by polynomials over integers or rationals), 
-#               ideal point over finite field , 
-#               computation options (LiftOptions) 
-#
-# See also 'LiftOptions()'.
-DeclareGlobalFunction( "ComputeApproxIdealPoints@FR" );
-@PadicLift.ComputeApproxIdealPoints := ComputeApproxIdealPoints@FR;
-DeclareGlobalFunction( "@PadicLift.ComputeApproxIdealPoints" ); # hack: to show function names when using tab completition for PadicLift 
-
-
-# given a finite field point of an ideal and an unknown compute corresponding minimal polynomial for the unknown over integers.
-# Parameters:  ( ideal, solution, unknown,  liftOptions )
-DeclareGlobalFunction( "ComputeMinimalPolynomial@FR" );
-@PadicLift.ComputeMinimalPolynomial := ComputeMinimalPolynomial@FR;
-DeclareGlobalFunction( "@PadicLift.ComputeMinimalPolynomial" );
-
-
-# Parameters:  ( ideal, solution, unknown, minimalPolynomialVariable, liftOptions )
-# minimalPolynomialVariable: usually same as unknown. See also CreateLiftOptions.
-DeclareGlobalFunction( "ComputeMinimalPolynomialEx@FR" );
-@PadicLift.ComputeMinimalPolynomialEx := ComputeMinimalPolynomialEx@FR;
-DeclareGlobalFunction( "@PadicLift.ComputeMinimalPolynomialEx" );
-
-
-# given a finite field point of an ideal and an unknown list compute corresponding minimal polynomials for the unknowns over integers.
-# Parameters:  ( solutionIdeal,  solutionPoint, unknowns,  liftOptions )
-# minimalPolynomialVariable: usually same as unknown. See also CreateLiftOptions.
- DeclareGlobalFunction( "ComputeMinimalPolynomials@FR" );
-@PadicLift.ComputeMinimalPolynomials := ComputeMinimalPolynomials@FR;
-DeclareGlobalFunction( "@PadicLift.ComputeMinimalPolynomials" ); 
-
-DeclareGlobalFunction( "LiftOptions@FR" );
-@PadicLift.LiftOptions := LiftOptions@FR;
-DeclareGlobalFunction( "@PadicLift.LiftOptions" );
-
-
-
-########################## lift utils
-
-DeclareProperty("IsLiftOptions", IsRecord );
-
-# compute a compatibility matrix M where M[i][j]=k if ABS(combinedPolRoots[k] - operation( firstPolRoots[i], secondPolRoots[j] ) <  tolerance
-# tolerance is adjusted depending on root values.
-# Parameters: ( firstPolRoots, secondPolRoots, combinedPolRoots, operation, maxTolerance  )
-DeclareGlobalFunction( "ComputeRootCompatibility@FR" );
-@PadicLift.ComputeRootCompatibility := ComputeRootCompatibility@FR;
-DeclareGlobalFunction( "@PadicLift.ComputeRootCompatibility" );
-
-# Parameters: ( firstPolRoots, secondPolRoots, combinedPolRoots, operation, maxTolerance , logger )
-DeclareGlobalFunction( "ComputeRootCompatibilityEx@FR" );
-@PadicLift.ComputeRootCompatibilityEx := ComputeRootCompatibilityEx@FR;
-DeclareGlobalFunction( "@PadicLift.ComputeRootCompatibilityEx" );
-
-
-# create a wrapper object for Jenkins-Traub algorithm to compute polynomial roots
-# Parameter: decimalPrecision 
-DeclareGlobalFunction( "CreateJenkinsTraubWrapper@FR" );
-@PadicLift.CreateJenkinsTraubWrapper := CreateJenkinsTraubWrapper@FR;
-DeclareGlobalFunction( "@PadicLift.CreateJenkinsTraubWrapper" );
-
-
-# compute roots using Jenkins Traub algorithm implementation
-# Parameter: polynomial, decimalPrecision
-DeclareGlobalFunction( "RootsByJenkinsTraub@FR" );
-@PadicLift.RootsByJenkinsTraub := RootsByJenkinsTraub@FR;
-DeclareGlobalFunction( "@PadicLift.RootsByJenkinsTraub" );
-
-
-######################################################## PRIVATE #############################################################
-@PadicLift.Internal := rec();
-
-DeclareGlobalFunction( "CREATE_LIFT_OPTIONS@FR");
-@PadicLift.Internal.CreateLiftOptions := CREATE_LIFT_OPTIONS@FR;
-
-DeclareGlobalFunction( "CHECK_LIFT_OPTIONS@FR" );
-@PadicLift.Internal.CheckLiftOptions := CHECK_LIFT_OPTIONS@FR;
-
-# compute  scalar product for matrix rows  ( (|.|_2)^2 ) (todo: how to compute a square root?)
-DeclareGlobalFunction( "ROW_NORMS@FR" );
-@PadicLift.Internal.RowNorms := ROW_NORMS@FR;
-
-# compute  scalar product  for matrix columns ( (|.|_2)^2 ) 
-DeclareGlobalFunction( "COLUMN_NORMS@FR" );
-@PadicLift.Internal.ColumnNorms := COLUMN_NORMS@FR;
-
-# divide row norms by minimum value. Returns a 'NormalizedRowNorms' record.
-DeclareGlobalFunction( "NORMALIZED_ROW_NORMS@FR" );
-@PadicLift.Internal.NormalizedRowNormw := NORMALIZED_ROW_NORMS@FR;
-
-
-DeclareGlobalFunction( "CREATE_LIFT_INFO@FR" );
-@PadicLift.Internal.CreateLiftInfo := CREATE_LIFT_INFO@FR;
-
-
-# Parameters: ( liftInfo1, liftInfo2 )
-DeclareGlobalFunction( "MERGE_LIFT_INFO@FR" );
-@PadicLift.Internal.MergeLiftInfo := MERGE_LIFT_INFO@FR;
-
-
-# Parameters: (unknown, indeterminates, liftResult, currentLatticeDim )
-DeclareGlobalFunction( "LLL_INPUT_FROM_LIFT@FR" );
-@PadicLift.Internal.LLLInputFromLift := LLL_INPUT_FROM_LIFT@FR;
-
-DeclareGlobalFunction( "IDEAL_POINTS_APPROXIMATION@FR" );
-@PadicLift.Internal.IdealPointsApproximation := IDEAL_POINTS_APPROXIMATION@FR;
-
-#  rename '..RootCompatibility' to '..CoordinateCompatibility' ?
-
-# adjust tolerance for coordinate pairing.
-# Postcondition: returns adustedTolerance <= to the 1/3 of the minimal distance between two roots in rootList and adustedTolerance <= maxTolerance
-# Parameters: ( maxTolerance, rootList)
-DeclareGlobalFunction("ADJUST_PAIRING_TOLERANCE@FR");
-@PadicLift.Internal.AdjustPairingTolerance := ADJUST_PAIRING_TOLERANCE@FR;
-
-# for a given lift try to find  the minimal polynomial in variable 'unknown' by guessing its degree (heurustic method)
-# starting from an initial lattice dimension, increase it until either a solution candidate is found or stop condition is triggered.
-# stop condition: either current lattice dimension > maxLatticeDimension or 
-#               the minimun norm of all lattice vectors did not decrease/change in comparison to the previous one
-# in case the stop conditon is triggered, proceed with next padic approximation instead.
-# Parameters: (unknown, indeterminates, liftResult, nextLiftResult, reductionOpts ) 
-#
-# todo: something is fishy relating to the stop condition...
-#
-DeclareGlobalFunction( "LLL_REDUCTION_ATTEMPT@FR" );
-@PadicLift.Internal.LLLReductionAttempt := LLL_REDUCTION_ATTEMPT@FR;
-
-# convert first lattice basis vector to a polynomial. 
-DeclareGlobalFunction( "LATTICE_BASIS_TO_POLYNOMIAL@FR" );
-@PadicLift.Internal.LatticeBasisToPolynomial := LATTICE_BASIS_TO_POLYNOMIAL@FR;
-
-
-# checks, if each row   contains at least one entry (exact=false)  or exact one entry (exact=true) 
-# Parameters: (compatibiltyMatrix, exact)
-DeclareGlobalFunction( "COMPATIBILITY_ROWS_VALID@FR");
- @PadicLift.Internal.CompatibilityRowsValid := COMPATIBILITY_ROWS_VALID@FR;
- 
- 
-# computes a basic compatibility matrix with property M[i][j]=1 if firstPolRoots[i] is compatible with secondPolRoots[j]. 
-# Parameters: ( firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts)
-# Preconditions: Size(secondPolRoots)<= Size(firstPolRoots).
-# Postconditions: returns compatibility matrix if rank of matrix is maximal and each row has exact one entry. Otherwise fails
-# See also: ComputeRootCompatibility(...)
-DeclareGlobalFunction( "COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR" );
-@PadicLift.Internal.ComputeHurwitzRootCompatibility := COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR;
-
-# checks, if a compatibility matrix M is valid 
-# (for each combined root there is a root compatibility and each row and column contains at least one entry ) 
-#  M[i][j]=k if firstRootlist[i] , secondRootlist[j] and combinedRootList[k] are compatible.
-# Parameters: (matrix, number of combined roots, logger )
-# See also: ComputeRootCompatibility(...)
-DeclareGlobalFunction( "IS_VALID_ROOT_COMPATIBILITY@FR");
-@PadicLift.Internal.IsValidRootCompatibility := IS_VALID_ROOT_COMPATIBILITY@FR;
-
-# given a finite field point of an ideal compute corresponding approximate ideal points over complex numbers.
-# Parameters:  ( ideal (over integers or rationals),  ideal point over finite field , lift options )
-# see also 'ComputeApproxIdealPoint@FR' .
-# limitations: may run faster than the generic version 'ComputeApproxIdealPoint' , but not succeed for all cases!
-DeclareGlobalFunction( "COMPUTE_APPROX_HURWITZ_IDEAL_POINTS@FR" );
-@PadicLift.Internal.ComputeApproxHurwitzIdealPoints := COMPUTE_APPROX_HURWITZ_IDEAL_POINTS@FR;
-
-#create a dummy logger function (logger interface: (loglevel, message) )
-DeclareGlobalFunction( "CREATE_EMPTY_LOGGER_FKT@FR" );
-@PadicLift.Internal.CreateEmptyLoggerFkt := CREATE_EMPTY_LOGGER_FKT@FR;
-
-DeclareGlobalFunction( "CREATE_FINITE_TEST_PROBLEM@FR" );
-@PadicLift.Internal.CreateFiniteTestProblem := CREATE_FINITE_TEST_PROBLEM@FR;
-
-
-DeclareGlobalFunction( "CREATE_RATIONAL_TEST_PROBLEM@FR" );
-@PadicLift.Internal.CreateRationalTestProblem := CREATE_RATIONAL_TEST_PROBLEM@FR;
-
-DeclareGlobalFunction( "CREATE_SYMM_TEST_PROBLEM@FR" );
-@PadicLift.Internal.CreateSymmTestProblem := CREATE_SYMM_TEST_PROBLEM@FR;
-
-
-
-MakeImmutable(@PadicLift.Internal);
-MakeImmutable(@PadicLift);
-
-
diff --git a/sandbox/hurwitz.kroeker/gap/padicLift.gi b/sandbox/hurwitz.kroeker/gap/padicLift.gi
deleted file mode 100644
index 9c48bc6..0000000
--- a/sandbox/hurwitz.kroeker/gap/padicLift.gi
+++ /dev/null
@@ -1,1783 +0,0 @@
-# is there a class of ideals ?
-# todo: - add blackbox functionality  - partly done
-# Q: does setFloats have global impact? 
-
-
-
-InstallGlobalFunction( RootsByJenkinsTraub@FR ,
-function ( polynomial, decimalPrecision)
-    local bitPrecision, complexUnivariatePolynomialRing, coeffData, conversionFactor,
-    controlDecimalPrecision, coeffDataCopy, fam, complexPol, pos ;
-
-    if not IsUnivariatePolynomial(polynomial) then 
-    	Error("JenkinsTraub: first parameter is not an univariate polynomial!" );
-    fi;
-    
-    if not IsPosInt(decimalPrecision) then 
-    	Error("JenkinsTraub: second parameter decimalPrecision is not a positive integer!" );
-    fi;
-
-    # determine bitPrecision from decimalPrecision
-    ##################################   
-      SetFloats( MPC, 100 );    
-
-        #conversionFactor :=  3.32192809488736; 
-        conversionFactor :=  Log(10.0_c)/Log(2.0_c);
-    
-        bitPrecision := decimalPrecision*conversionFactor; 
-        # bitPrecision := convertFloatToIntSimple( bitPrecision );
-        bitPrecision :=  Int(RealPart( bitPrecision) );
-          
-    
-        conversionFactor :=  Log(2.0_c)/Log(10.0_c);
-        controlDecimalPrecision := bitPrecision*conversionFactor;
-        while controlDecimalPrecision<decimalPrecision*1.0 do
-            bitPrecision := bitPrecision + 1;
-            controlDecimalPrecision := bitPrecision*conversionFactor;
-        od;
-    ##################################   
-        
-    SetFloats( MPC, bitPrecision );    
-
-    complexUnivariatePolynomialRing := PolynomialRing( MPC_PSEUDOFIELD,1 ); # 1 indeterminate
- 
-    fam := FamilyObj( One(complexUnivariatePolynomialRing) ); 
-        
-
-    # coerce polynomial to  complexUnivariatePolynomialRing.      
-    if not FamilyObj(polynomial) = fam then
-      complexPol := CoercePolynomialTensor@FR(polynomial,complexUnivariatePolynomialRing);
-    fi;
-    ##################################
-
-    return RootsFloat(complexPol);;
-end
-);
-
-
-InstallGlobalFunction( CreateJenkinsTraubWrapper@FR ,
-function( decimalPrecision )
-
-  local rootCalculator, bitPrecision, complexUnivariatePolynomialRing,  fam ;
-
-    rootCalculator := rec();
-
-    rootCalculator.getDecimalPrecision := function()
-        return decimalPrecision;
-    end;
-
-     rootCalculator.decimalToBitPrecision := function( decimalPrecision )
-         local localBitPrecision,  conversionFactor,
-        controlDecimalPrecision ;
-
-        SetFloats( MPC, 100 );    
-    
-        conversionFactor :=  Log(10.0_c)/Log(2.0_c);
-    
-        localBitPrecision := decimalPrecision*conversionFactor; 
-        localBitPrecision := Int ( RealPart( localBitPrecision ) );
-    
-        conversionFactor :=  Log(2.0_c)/Log(10.0_c);
-        controlDecimalPrecision := localBitPrecision*conversionFactor;
-        while controlDecimalPrecision<decimalPrecision*1.0 do
-            localBitPrecision := localBitPrecision + 1;
-            controlDecimalPrecision := localBitPrecision*conversionFactor;
-        od;
-        return localBitPrecision;
-    end;
-
-    bitPrecision := rootCalculator.decimalToBitPrecision(decimalPrecision);
-
-    rootCalculator.BitPrecision := function()
-        return bitPrecision;
-    end;
-
-
-    SetFloats( MPC, bitPrecision );    
-
-    complexUnivariatePolynomialRing := PolynomialRing( MPC_PSEUDOFIELD,1 ); # 1 indeterminate
-    fam := FamilyObj( One(complexUnivariatePolynomialRing) ); 
-    
-    rootCalculator.getDstPolynomialFam := function()
-        return fam;
-    end;
-    
-    
-    rootCalculator.getPolynomialRing :=function( )  
-        return complexUnivariatePolynomialRing ;
-    end;
-
-
-    rootCalculator.computeRoots := function (polynomial)
-        local complexPoly;
-        complexPoly := polynomial;
-        # only convert if not already converted. Todo: this should be checked in 'CoercePolynomialTensor'. 
-        # Reason for this special case: coercion fails, if polynomial is already in complex ring.
-        if not FamilyObj(One(complexPoly)) = fam then
-            complexPoly := CoercePolynomialTensor@FR( polynomial, complexUnivariatePolynomialRing );
-        fi;
-        return RootsFloat(complexPoly);
-    end;
-    return Immutable(rootCalculator);
-end
-);
-
-
-
-InstallGlobalFunction( QuadraticLiftStep@FR ,
-function ( gens, jacobian, indeterminates, solutionApprox )
-    local nextChar, higherSolutionApprox, JacobianAtSolution,  rightHandSide, correction, idealRing;
-	Assert(0, IsZero( EvalPolynomialTensor@FR(gens, indeterminates, solutionApprox)) );
-
-	if not IsZero( EvalPolynomialTensor@FR(gens, indeterminates, solutionApprox) ) then
-		Error("solution does not belong to ideal");
-	return [];
-	fi;
- 
-    # improve padic approximation
-        nextChar := ( Characteristic(solutionApprox) )^2;
-        higherSolutionApprox := PromoteScalarTensor@FR( solutionApprox, ZmodnZ( nextChar ) ) ;
-        JacobianAtSolution := EvalPolynomialTensor@FR( jacobian, indeterminates, higherSolutionApprox);
-    
-        if not Size(indeterminates) = Rank(PromoteScalarTensor@FR(JacobianAtSolution,Integers)) then
-            Error("Jacobian is not invertible");
-            return [];
-        fi;
-            
-        rightHandSide := EvalPolynomialTensor@FR(gens, indeterminates, higherSolutionApprox);
-    
-        correction := -(JacobianAtSolution^-1) *rightHandSide;
-        higherSolutionApprox := higherSolutionApprox + correction;
-
-    # result check
-        Assert(0, IsZero( EvalPolynomialTensor@FR(gens,indeterminates,higherSolutionApprox)) );
-
-    return higherSolutionApprox;
-end
-);
-
-
-# blackbox : ideal can check if point belongs to ideal; 
-# -for a point a jacobian can be computed.
-InstallGlobalFunction( BlackBoxQuadraticLiftStep@FR ,
-function ( evalIdealGens, computeJacobianAt, solutionApprox )
-    local nextChar, higherSolutionApprox, JacobianAtSolution,  rightHandSide, correction;
-   
-    # parameter consistency check
-    
-        if not IsZero( evalIdealGens(  solutionApprox) ) then
-            Error("solution does not belong to ideal");
-            return [];
-        fi;
- 
-    # improve padic approximation
-        nextChar := ( Characteristic(solutionApprox) )^2;
-        higherSolutionApprox := PromoteScalarTensor@FR( solutionApprox, ZmodnZ( nextChar ) ) ;
-        JacobianAtSolution := computeJacobianAt( higherSolutionApprox );
-       
-        if not Maximum(Size(JacobianAtSolution),Size(JacobianAtSolution[1])) = Rank(PromoteScalarTensor@FR(JacobianAtSolution,Integers)) then
-            Error("Jacobian is not invertible");
-            return [];
-        fi;
-            
-        rightHandSide := evalIdealGens(  higherSolutionApprox );
-    
-        correction := -(JacobianAtSolution^-1) *rightHandSide;
-        higherSolutionApprox := higherSolutionApprox + correction;
-
-    # result check
-        Assert(0, IsZero( evalIdealGens(  higherSolutionApprox) )  );
-
-    return higherSolutionApprox;
-end
-);
-
-
-InstallGlobalFunction( PadicLift@FR ,
-function( ideal,  solutionPoint , numLiftDepth )
-    
-    local charSolution, laring , indeterminates , gens , JacobianOfIdeal, currLiftDepth, localSolution;
-    charSolution := Characteristic(solutionPoint);
-    Assert( 0, not IsZero( charSolution ));
-    Assert( 0, IsOne( Size( Set( Factors(charSolution) ))) ); # 
-
-    #Assert(0, IsIdeal(ideal) ); # todo: how to check ? 
-    Assert( 0, IsZero( Characteristic (ideal)) );
-    laring := LeftActingRingOfIdeal( ideal );
-  
-    Assert(0, IsPolynomialRing(laring) );
-    indeterminates := IndeterminatesOfPolynomialRing(laring);
-  
-    gens := GeneratorsOfTwoSidedIdeal(ideal);   
-    Assert(0, IsZero(EvalPolynomialTensor@FR(gens, indeterminates, solutionPoint)));
-    
-    JacobianOfIdeal := Jacobian@FR( gens, indeterminates);
-
-    currLiftDepth := 0;
-    localSolution := solutionPoint;
-    while currLiftDepth < numLiftDepth do 
-      localSolution := QuadraticLiftStep@FR( gens, JacobianOfIdeal,indeterminates, localSolution);
-      currLiftDepth := currLiftDepth + 1;
-    od;
-    return localSolution;
-end
-);
-
-
-
-InstallGlobalFunction( BlackBoxPadicLift@FR ,
- function( evaluateIdealGens, jacobianAt,  solutionPoint , numLiftDepth)
-    
-    local charSolution, currLiftDepth, localSolution;
-    charSolution := Characteristic(solutionPoint);
-    Assert( 0,not IsZero( charSolution ));
-    Assert( 0, IsOne( Size( Set( Factors(charSolution) ))) ); # 
-   
-    Assert(0, IsZero(evaluateIdealGens( solutionPoint)) );
-
-    currLiftDepth := 0;
-    localSolution := solutionPoint;
-    while currLiftDepth < numLiftDepth do 
-      localSolution := BlackBoxQuadraticLiftStep@FR( evaluateIdealGens, jacobianAt, localSolution);
-      currLiftDepth := currLiftDepth + 1;
-    od;
-    return localSolution;
-end
-);
-
-
-
-InstallGlobalFunction( CHECK_LIFT_OPTIONS@FR ,
-function(liftOptions)
-    Assert(0, liftOptions.verbose()=true or liftOptions.verbose()=false);
-    Assert(0, liftOptions.verbosePairing()=true or liftOptions.verbosePairing()=false);
-    Assert(0, liftOptions.verboseLevel() in Integers);
-    Assert(0,  liftOptions.decimalPrecision() in PositiveIntegers);
-    Assert(0,  liftOptions.minColumnNormDistanceFactor() in PositiveIntegers);
-    Assert(0,  liftOptions.initialLiftDepth() in NonnegativeIntegers);
-    Assert(0,  liftOptions.initialLatticeDim() in PositiveIntegers);
-    Assert(0,  liftOptions.maxLiftDepth() in PositiveIntegers or liftOptions.maxLiftDepth()=infinity );
-    Assert(0,  liftOptions.maxLatticeDim() in PositiveIntegers or liftOptions.maxLatticeDim()=infinity );
-    Assert(0,  liftOptions.latticeDimIncrementFkt(5) > 5 );
-    Assert(0,  IsFloat( liftOptions.maxPairingTolerance() ) and AbsoluteValue( liftOptions.maxPairingTolerance() ) =  liftOptions.maxPairingTolerance()  );
-end
-);
-
-InstallGlobalFunction(  CREATE_EMPTY_LOGGER_FKT@FR, 
-function()
-	return  function (level, message) end;
-end
-);
-
-	
-
-# optional: maybe split lift options and pairing options...
-InstallGlobalFunction ( CREATE_LIFT_OPTIONS@FR ,
- function(optionData)
-	local privateData, liftOptions;
-
-	privateData :=  optionData ;
-	
-	liftOptions := rec( );
-
-	liftOptions.decimalPrecision := function() return  privateData.rootCalculator.getDecimalPrecision(); end;
-	liftOptions.setDecimalPrecision := function(precision)  
-	    Assert(0, precision in PositiveIntegers);
-        privateData.rootCalculator :=	privateData.rootCalculatorConstructor( precision );
-        # todo: improvement: RootCalculator supports 'setDecimalPrecision'.
-		#Error(" please call setRootCalculator instead: e.g.  setRootCalculator( CreateJenkinsTraubWrapper@FR( decimalPrecision );");
-		
-	end;
-	
-	liftOptions.rootCalculator := function() return  privateData.rootCalculator; end;
-	liftOptions.setRootCalculator := function(rootCalculator)  
-		local rnames;
-		rnames := RecNames(rootCalculator);
-		if IsRecord(rootCalculator) and 
- 		   "computeRoots" in rnames and
- 		   "decimalPrecision" in rnames 
- 		then 
-			privateData.rootCalculator := rootCalculator;
-		else
-			Error("rootCalculator does not match interface (\"ComputeRoots\"(polynomial), \"decimalPrecision\"() ");
-		fi;
-	end;
-	
-	
-	liftOptions.maxLiftDepth := function() return  privateData.maxLiftDepth; end;
-	liftOptions.setMaxLiftDepth := function(liftDepth)  
-		if not liftDepth in NonnegativeIntegers and not liftDepth=infinity then 
-			Error(" maxLiftDepth has to be a nonnegative int or infinity");	
-		fi;	
-		privateData.maxLiftDepth := liftDepth;
-	end;
-	
-	
-	liftOptions.maxLatticeDim := function() return  privateData.maxLatticeDim; end;
-	liftOptions.setMaxLatticeDim := function(maxLatticeDim)  
-		if not  maxLatticeDim in PositiveIntegers and not maxLatticeDim=infinity then 
-			Error(" maxLiftDepth has to be a positive int or infinity");	
-		fi;	
-		privateData.maxLatticeDim := maxLatticeDim;
-	end;
-	
-	
-	liftOptions.verbose := function() return  privateData.verbose; end;
-	liftOptions.setVerbose := function(verbose)  
-		if not verbose=true and not verbose=false then 
-			Error(" setVerbose to true or to false ");	
-		fi;	
-		privateData.verbose := verbose;
-	end;
-	
-	
-	liftOptions.verbosePairing := function() return  privateData.verbosePairing; end;
-	liftOptions.setVerbosePairing := function(verbosePairing)  
-		if not verbosePairing=true and not verbosePairing=false then 
-			Error(" setVerbosePairing to true or to false ");	
-		fi;	
-		privateData.verbosePairing := verbosePairing;
-	end;
-	
-	
-	liftOptions.verboseLevel := function() return  privateData.verboseLevel; end;
-	liftOptions.setVerboseLevel := function(level)  
-		if not level in NonnegativeIntegers then 
-			Error(" verbose level not a nonnegative integer ");	
-		fi;	
-		if level>0 then
-			privateData.verbose := true;
-		fi;
-		privateData.verboseLevel := level;
-	end;
-	
-	
-	liftOptions.minColumnNormDistanceFactor := function() return  privateData.minColumnNormDistanceFactor; end;
-	liftOptions.setMinColumnNormDistanceFactor := function(factor)  
-		if not factor>=1 then 
-			Error(" expected min column norm distance factor >=1 ");	
-		fi;	
-		privateData.minColumnNormDistanceFactor := factor;
-	end;
-	
-	
-	liftOptions.initialLiftDepth := function() return  privateData.initialLiftDepth; end;
-	liftOptions.setInitialLiftDepth := function(depth)  
-		if not depth in NonnegativeIntegers then 
-			Error(" initial lift depth not an integer ");	
-		fi;	
-		privateData.initialLiftDepth := depth;
-	end;
-	
-	
-	liftOptions.initialLatticeDim := function() return  privateData.initialLatticeDim; end;
-	liftOptions.setInitialLatticeDim := function(latticeDim)  
-		if not latticeDim in PositiveIntegers then 
-			Error(" initial lattice dimension not a positive integer ");	
-		fi;	
-		privateData.initialLatticeDim := latticeDim;
-	end;
-	
-	
-	liftOptions.maxPairingTolerance := function() return  privateData.maxPairingTolerance; end;
-	liftOptions.setMaxPairingTolerance := function( pairingTolerance )  
-		if not  IsFloat(pairingTolerance) or AbsoluteValue(pairingTolerance)<>pairingTolerance or IsZero(pairingTolerance) then 
-			Error(" root pairing tolerance has to be a positive floating number ");	
-		fi;	
-		privateData.maxPairingTolerance :=pairingTolerance;
-	end;
-	
-	
-	liftOptions.latticeDimIncrementFkt := function(val) return  privateData.latticeDimIncrementFkt(val); end;
-	 liftOptions.setLatticeDimIncrementFkt := function(incrementFunction)
-	 	if not IsFunction(incrementFunction) then 
-	 		Error("set latticeDimIncrementFkt: expected a function accepting an integer");
-	 	fi;
-	 	privateData.latticeDimIncrementFkt := incrementFunction;
-	 end;     
-		                            
-	
-	liftOptions.clone 	:= function()
-		local newLiftOptions;
-		newLiftOptions := CREATE_LIFT_OPTIONS@FR( ShallowCopy( privateData )  ) ;
-		return newLiftOptions;
-	end;
-
-	liftOptions.print := function()
-		local name,recNames;
-		Info(InfoFR,1 ,"LiftOptions object: \n");
-		for name in RecNames(privateData) do
-			if IsRecord( privateData.(name) ) then 
-				recNames :=  ShallowCopy(String( RecNames(privateData.(name)) ));
-				Assert(0, recNames [1]='[');
-				Assert(0, recNames [Size(recNames)]=']');
-				recNames[1] := '(';
-				recNames[Size(recNames)] := ')';
-				Info(InfoFR,1, Concatenation("\t", name, " \t := rec", recNames, ";\n" ));
-			else
-				Info(InfoFR,1, Concatenation("\t", name, " \t := ", String(privateData.(name)), ";\n" ));
-			fi;
-		od;
-			Info(InfoFR,1 ,"end; \n");
-	end;
-	
-	liftOptions.Setters := function()
-		local name,replacedName;
-		Info(InfoFR,1,"Set functions:\n");
-		 for name in RecNames(liftOptions) do
-			 
-			 replacedName := ReplacedString(name,"set","");
-			 
-			 if  replacedName<>name  then 
-			 	Info(InfoFR,1, Concatenation("\t", name, "(); \n" ));
-			 fi;
-		od;
-	 end;
-	 
- 	liftOptions.Getters := function()
-		local name,replacedName;
-		Info(InfoFR,1,"Get functions:\n");
-		 for name in RecNames(liftOptions) do
-			 replacedName := ReplacedString(name,"set","");
-			 if  Size(replacedName)=Size(name)  then 
-			 	Info(InfoFR,1, Concatenation("\t", name, " (); \n" ));
-			 fi;
-		od;
-	 end;
-	 
-	privateData.logger := function (opts, level, message)
-	if opts.verbose() then
-	    if  opts.verboseLevel() >= level then
-	    if level<1 then level:=1; fi;
-		Info(InfoFR,level,message);    
-		Info(InfoFR,level,"\n");
-	    fi;
-	fi;
-	end;
-	
-	liftOptions.logger := function (level, message)
-	 	privateData.logger( liftOptions, level, message);
-	end;
-	
-	liftOptions.dataType:="LiftOptions";
-	
-	CHECK_LIFT_OPTIONS@FR( liftOptions );
-	
-	liftOptions := Immutable( liftOptions );
-	
-	
-
-	return liftOptions;
-end
-);
-
-
-# todo: improve interface: optionsdata knows, which root calculator to use. 
-InstallGlobalFunction( LiftOptions@FR , function()
-local optionData, objectifiedData, privateData, liftOptions,getPrivateData;
-
-
-	optionData:= rec( );
-	 optionData.latticeDimIncrementFkt := function(latticeDim)
-                                        return latticeDim+1;
-		                            end;
-	optionData.maxLiftDepth := infinity;
-	optionData.maxLatticeDim := infinity;
-	optionData.verbose := false;
-
-	optionData.minColumnNormDistanceFactor := 100;
-	optionData.initialLatticeDim := 1;
-	optionData.initialLiftDepth := 0;
-
-    optionData.rootCalculatorConstructor := CreateJenkinsTraubWrapper@FR ;
-	optionData.verbosePairing := false;
-	optionData.rootCalculator := CreateJenkinsTraubWrapper@FR( 16 );
-	optionData.maxPairingTolerance := 0.1;
-	optionData.verboseLevel := 0;
-	
-    	return CREATE_LIFT_OPTIONS@FR( optionData );
-end
-);
-
-
-
-
-
-InstallMethod( IsLiftOptions, "", [IsRecord],
-function(record)
-	if not "type" in RecNames(record) then
-		return false;
-	fi;
-
-	return record.dataType="LiftOptions";
-end
-);
-
-# sandbox: 
-# @PadicLift.Tests.TEST_LIFT_OPTIONS := TEST_LIFT_OPTIONS@FR;
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_LIFT_OPTIONS", 
-#DeclareGlobalFunction( "@PadicLift\.Tests\.TEST_LIFT_OPTIONS"); 
-#InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_LIFT_OPTIONS", @PadicLift\.Tests\.TEST_LIFT_OPTIONS);
-#InstallGlobalFunction( @PadicLift\.Tests\.TEST_LIFT_OPTIONS, 
- function()
-	local liftOptions;
-	liftOptions :=  LiftOptions@FR();
-
-    #bla := Immutable(rec());
-    #bla.bla := 5;
-    #Error("bla");
-    
-	liftOptions.setMaxLiftDepth(22);
-	Assert(0, liftOptions.maxLiftDepth()=22);
-			
-	liftOptions.setMaxLatticeDim(3);
-	Assert(0, liftOptions.maxLatticeDim() = 3 );
-	
-	liftOptions.setVerboseLevel(2);
-	Assert(0, liftOptions.verboseLevel()=2);
-	
-	liftOptions.setVerbosePairing(false);
-	Assert(0, liftOptions.verbosePairing() = false );
-	
-	liftOptions.setInitialLatticeDim(4);
-	Assert(0, liftOptions.initialLatticeDim() = 4 );
-	
-	liftOptions.setInitialLiftDepth(0);
-	Assert(0, liftOptions.initialLiftDepth() = 0 );
-	
-	liftOptions.setMaxPairingTolerance(0.1);
-	Assert(0, liftOptions.maxPairingTolerance() = 0.1 );
-	
-	CHECK_LIFT_OPTIONS@FR( liftOptions );
-		
-end);	
-
-
-
-# input is a Integer Matrix where the rows form the Basis of the lattice.
-# DeclareGlobalFunction("ROW_NORMS@FR");
-InstallGlobalFunction( ROW_NORMS@FR ,
-function(mat)
-    local MM;
-    if not IsMatrix(mat) then 
-    	Error("ROW_NORMS@FR: parameter is not a matrix!");
-    fi;
-    
-    MM  := PromoteScalarTensor@FR( mat, Rationals);
-    MM := MM*TransposedMat(MM);
-    return  List( [1..Size(MM)], n->MM[n][n] );
-end
-);
-
-# todo: why did you copy code? => because TransposedMat could became costly for big LLL Matrices.
-# DeclareGlobalFunction("COLUMN_NORMS@FR");
-InstallGlobalFunction( COLUMN_NORMS@FR ,
-function(mat)
-    local MM;
-    if not IsMatrix(mat) then 
-    	Error("ColumnNorms: parameter is not a matrix!");
-    fi;
-
-    MM  := PromoteScalarTensor@FR( mat, Rationals);
-    MM := TransposedMat(MM)*MM;
-    return  List( [1..Size(MM)], n->MM[n][n] );
-end
-);
-
-
-
-# DeclareGlobalFunction("NORMALIZED_ROW_NORMS@FR");
-InstallGlobalFunction(  NORMALIZED_ROW_NORMS@FR ,
-function (mat)
-    local rowNormlist, minM, maxM, normalizedRowNormList, result,pos;
-    if not IsMatrix(mat) then 
-    	Error(" NORMALIZED_ROW_NORMS: parameter is not a matrix!");
-    fi;
-    
-    rowNormlist := ROW_NORMS@FR( mat );
-    minM := Minimum( rowNormlist );
-    maxM := Maximum( rowNormlist );
-    normalizedRowNormList :=  List( [ 1..Size(rowNormlist) ], pos-> rowNormlist[pos]*RealPart(1.0)/minM );
-    #normalizedRowNormList :=  List( [ 1..Size(rowNormlist) ], pos-> rowNormlist[pos]/minM );
-    result := rec();
-    result.unchanged := rowNormlist;
-    result.normalized := normalizedRowNormList;
-    result.max := maxM;
-    result.min := minM;
-    result.dataType := "NormalizedRowNorms";
-    return Immutable(result);  
-end
-);
-
-
-
-
-InstallGlobalFunction( CREATE_LIFT_INFO@FR ,
-function( maxLiftDepth, maxLatticeDimension, requiredLatticeDimension, minLiftDepth )
-    local liftInfo;
-    liftInfo := rec();
-    liftInfo.dataType := "LiftInfo";
-    liftInfo.minLiftDepth := minLiftDepth;
-    liftInfo.maxLiftDepth := maxLiftDepth;
-    liftInfo.maxLatticeDimension := maxLatticeDimension;
-    liftInfo.requiredLatticeDimension := requiredLatticeDimension;
-    return Immutable(liftInfo);
-end
-);
-
-
-InstallGlobalFunction( MERGE_LIFT_INFO@FR ,
-function( liftInfo1, liftInfo2 )
-    local minLiftDepth,maxLiftDepth, maxLatticeDimension, requiredLatticeDimension;
-
-    maxLiftDepth := Maximum ( liftInfo1.maxLiftDepth,liftInfo2.maxLiftDepth );
-    minLiftDepth := Minimum ( liftInfo1.minLiftDepth,liftInfo2.minLiftDepth );
-    Info(InfoFR,2, Concatenation ( "minLiftDepth: = ", String(minLiftDepth) , "\n" ) );
-    maxLatticeDimension := Maximum ( liftInfo1.maxLatticeDimension, liftInfo2.maxLatticeDimension );
-    requiredLatticeDimension := Null@FR;
-    if ( not liftInfo1.requiredLatticeDimension=Null@FR  and not liftInfo2.requiredLatticeDimension=Null@FR ) then 
-        requiredLatticeDimension :=  Maximum ( liftInfo1.requiredLatticeDimension, liftInfo2.requiredLatticeDimension );
-    fi;
-    return CREATE_LIFT_INFO@FR( maxLiftDepth, maxLatticeDimension, requiredLatticeDimension,minLiftDepth );
-end
-);
-
-
-
-InstallGlobalFunction( LLL_INPUT_FROM_LIFT@FR ,
-function( unknown, indeterminates, liftResult, currentLatticeDim )
-    local liftResultOverIntegers, M, sM, idx, result;
-
-    liftResultOverIntegers := PromoteScalarTensor@FR( liftResult, Rationals ); 
-    M :=  EvalPolynomialTensor@FR( [ List( [0..currentLatticeDim-1], i->unknown^i) ], indeterminates, liftResultOverIntegers );
-    Append( M[1], [ Characteristic(liftResult) ] );
-    
-    sM := List( [1..currentLatticeDim+1] , n-> List( [1..currentLatticeDim],l->0));
-    
-    # write kernel(M) : (each 'sM' column is a kernel element)
-    for idx in [1..Size(M[1])-1] do
-        sM[1][idx ] := -M[1][idx+1];
-        sM[idx+1][idx] := M[1][1];
-    od;
-    # remove last 'sM' row and transpose the result.
-    result := TransposedMat( List( [1..Size(sM)-1], n->sM[n] ) );
-   
-    return  PromoteScalarTensor@FR( result, Rationals );
-end
-);
-
-
-
-
-
-# try to find for a given lift the minimal polynomial in variable 'unknown' by guessing its degree (heurustic method)
-# latticeBasisNormList is evaluated by the heuristic method
-InstallGlobalFunction( LLL_REDUCTION_ATTEMPT@FR ,
-function (unknown, indeterminates, liftResult, nextLiftResult, reductionOpts ) 
-     
-   local reducedLiftResult, currentLatticeDim, lastColumnNormMin, LLLInput, bvec, basisNormRecord, nextLiftResultOverInts;
-  
-
-    reducedLiftResult := rec();
-    reducedLiftResult.foundMinPolyCandidate := false;
-    reducedLiftResult.latticeBasisNormList := [];
-    reducedLiftResult.latticeBasis := Null@FR;
-    reducedLiftResult.minPolynomial := Null@FR;
-    reducedLiftResult.liftInfo := Null@FR;
-    reducedLiftResult.currentLatticeDim   :=-1;
-    reducedLiftResult.dataType := "ReducedPadicLiftResult";
- 
-    currentLatticeDim  := reductionOpts.initialLatticeDim();
-    
-    lastColumnNormMin := -1;
-    nextLiftResultOverInts :=  PromoteScalarTensor@FR(nextLiftResult,Integers);
-
-    while currentLatticeDim <= reductionOpts.maxLatticeDim()  do 
-        reductionOpts.logger(1, Concatenation("# currentLatticeDim: ", String(currentLatticeDim) ) );
-        LLLInput := LLL_INPUT_FROM_LIFT@FR(unknown, indeterminates, liftResult, currentLatticeDim );
-        reducedLiftResult.latticeBasis := FPLLLReducedBasis( LLLInput );
-     
-        # test, if a solution have been found in this step (reducedLiftResult.foundMinPolyCandidate):
-            bvec :=   EvalPolynomialTensor@FR(  List([0..currentLatticeDim-1],n->unknown^n ),  indeterminates, nextLiftResultOverInts ) ;
-    
-            basisNormRecord := NORMALIZED_ROW_NORMS@FR( reducedLiftResult.latticeBasis );
-            if  IsZero( PromoteScalarTensor@FR( bvec*( reducedLiftResult.latticeBasis [1] ), nextLiftResult[1] ) ) and 
-                EuclideanQuotient( basisNormRecord.max, basisNormRecord.min )> reductionOpts.minColumnNormDistanceFactor()  then 
-                 reducedLiftResult.foundMinPolyCandidate := true;
-            fi;
-        #TODO: sometimes first condition ( "IsZero (PromoteScalarTensor@FR( bvec*firstBasisRow, nextLiftResult[1] ) )" ) passes, 
-        #      but we do not have a solution. Due to HC if we will use a higher lift, this could be detected at the end.
-        #
-        #TODO: instead of hardcoding, parametrize lllReduction with a stop condition for increasing lattice dimension: 
-        #       is it sufficient for a generic stop condition to pass as input previous and current latticeBasis ?
-        
-        Append (reducedLiftResult.latticeBasisNormList , [ basisNormRecord ]) ;
-        reductionOpts.logger( 2, Concatenation("column norms: ", String( basisNormRecord.normalized ) ));
-        if   lastColumnNormMin=basisNormRecord.min  then 
-              reductionOpts.logger(1, " lattice dimension increase: stop condition triggered. ");
-               break;
-        fi;
-
-       if      reducedLiftResult.foundMinPolyCandidate  then  
-                reductionOpts.logger(1, Concatenation("found minpoly candidate; lattice dimension: ", String(currentLatticeDim) ) );
-               break;
-        fi;
-
-        lastColumnNormMin := basisNormRecord.min;
-        Assert(0,  (reductionOpts.latticeDimIncrementFkt ( currentLatticeDim )) > currentLatticeDim or currentLatticeDim = infinity );
-        currentLatticeDim := reductionOpts.latticeDimIncrementFkt( currentLatticeDim );
-    od;
-    # todo: Typ für Rückgabe einfuehren.
-    reducedLiftResult.currentLatticeDim   := currentLatticeDim;
-    reductionOpts.logger( 3, Concatenation("LLLReductionAttempt result:", String(reducedLiftResult)));     
-    return reducedLiftResult;
-end
-);
-
-
-
-InstallGlobalFunction( LATTICE_BASIS_TO_POLYNOMIAL@FR,
-function (latticeBasis, variable)
-    local localVar, nrows, pol;
-    localVar := Null@FR;
-    if variable = Null@FR then 
-         localVar := Indeterminate(Rationals);
-    else
-       # TODO: ensure that variable is an indeterminate  ( either of rationals or of Integers ) 
-       localVar :=variable;    
-    fi;
-    nrows := Size( latticeBasis );
-    pol :=  List( [0..nrows-1] , exp->localVar^exp) *( PromoteScalarTensor@FR( latticeBasis[1], localVar) );
-    return pol;
-end
-);
-
-
-# PadicLift.ComputeMinimalPolynomal
-# optional: it is thinkable that opts.maxLiftDepth() is depending on the unknown (if there is some apriori knowledge)
-InstallGlobalFunction(  ComputeMinimalPolynomialEx@FR ,
-function( ideal, solution, unknown, minimalPolynomialVariable, liftOptions  )
-
-    local  gens, jacobianOfIdeal,  currLiftDepth, indeterminates, liftResult, nextLiftResult, 
-    localLiftOptions,  minimalPolynomialCandidateFactors, idealRing, reducedLiftResult ;
- 
-    CHECK_LIFT_OPTIONS@FR (liftOptions);
-
-    idealRing := LeftActingRingOfIdeal(ideal);
-    Assert(0, IsPolynomialRing(idealRing) );
-    Assert(0, idealRing = RightActingRingOfIdeal(ideal) ) ;
-    indeterminates := IndeterminatesOfPolynomialRing(idealRing);
-    Assert(0, unknown in idealRing);
-
-    liftOptions.logger(2, "ComputeMinimalPolynomial@FR" );
-    
-    # assert( idealRing === ring unknown); TODO: how to check?
-
-    gens := GeneratorsOfTwoSidedIdeal( ideal );    
-    Assert(0, IsZero( EvalPolynomialTensor@FR( gens, indeterminates, solution ) ) );
-
-    jacobianOfIdeal := Jacobian@FR ( gens, indeterminates) ;
-
-   
-    reducedLiftResult := Null@FR;
-
-    currLiftDepth := 0;
-    liftResult :=  solution ;
-    
-    nextLiftResult :=    QuadraticLiftStep@FR( gens,  jacobianOfIdeal, indeterminates,  liftResult);
-
-    # increase lift depth and perform LLL until a solution is found or maxLiftDepth is reached.
-    while currLiftDepth <= liftOptions.maxLiftDepth()  do 
-        liftOptions.logger(1, Concatenation("#\n # currLiftDepth: ", String(currLiftDepth) ));
-        
-        # perform LLL only if (currLiftDepth >= startingLiftDepth ). 
-        # The condition is useful in case minimalLiftDepth (=startingLiftDepth ) is known (e.g. from similar previous computations )
-        if ( currLiftDepth >= liftOptions.initialLiftDepth() ) then   
-        
-            reducedLiftResult := LLL_REDUCTION_ATTEMPT@FR(   unknown, indeterminates, liftResult,  nextLiftResult, liftOptions );
-            
-            if  reducedLiftResult.foundMinPolyCandidate  then  
-                liftOptions.logger(1, Concatenation("#FinalLiftDepth: " ,String (currLiftDepth) ) );
-                break;
-            fi;
-        fi;
-        currLiftDepth := currLiftDepth+1;    
-        liftResult := nextLiftResult;
-        nextLiftResult :=     QuadraticLiftStep@FR(  gens,  jacobianOfIdeal, indeterminates, liftResult);
-    od;
-  
-    if reducedLiftResult=Null@FR or not reducedLiftResult.foundMinPolyCandidate   then  
-        Info(InfoFR,1, "failed to compute minimal polynomial");
-        return fail;
-    fi;
-  
-    reducedLiftResult.minPolynomial :=  LATTICE_BASIS_TO_POLYNOMIAL@FR( reducedLiftResult.latticeBasis, minimalPolynomialVariable );
-
-    liftOptions.logger(1, Concatenation("---------------polynomial candidate degree: ", String(Degree(reducedLiftResult.minPolynomial)))  );
-    minimalPolynomialCandidateFactors :=   Factors( reducedLiftResult.minPolynomial) ;
-
-    if ( Size( minimalPolynomialCandidateFactors) >1) then
-        liftOptions.logger(1, "----------------lattice dimension too big: reducing lattice dimension ");
-       localLiftOptions :=  liftOptions.clone();
-       localLiftOptions.setInitialLatticeDim( localLiftOptions.initialLatticeDim() - Size(minimalPolynomialCandidateFactors )+1 );
-       return ComputeMinimalPolynomialEx@FR( ideal,  solution, unknown, minimalPolynomialVariable, localLiftOptions );
-    fi;
-
-    reducedLiftResult.unknown := unknown;
-    reducedLiftResult.liftInfo := CREATE_LIFT_INFO@FR( currLiftDepth, reducedLiftResult.currentLatticeDim, (Degree (reducedLiftResult.minPolynomial) + 1),currLiftDepth );
-   
-    return Immutable(reducedLiftResult);
-end
-);
-
-
-InstallGlobalFunction(  ComputeMinimalPolynomial@FR ,
-function( ideal, solution, unknown,  liftAndLLLOptions)
-	return ComputeMinimalPolynomial@FR( ideal, solution, unknown, unknown,   liftAndLLLOptions);
-end
-);
-
-
-InstallGlobalFunction( ComputeMinimalPolynomials@FR ,
-function( solutionIdeal,  solutionPoint, unknowns,  computeOptions )
-
-    local unknown, liftResult, minimalPolynomialsData, mergedLiftInfo, 
-          minPolVar, optsCopy, idealRing, indeterminates, unknownIdx;
-
-    Assert(0,  LeftActingRingOfIdeal (solutionIdeal)=RightActingRingOfIdeal (solutionIdeal) );
-    idealRing  :=  LeftActingRingOfIdeal (solutionIdeal);
-    indeterminates := IndeterminatesOfPolynomialRing(idealRing);
-
-    CHECK_LIFT_OPTIONS@FR (computeOptions);
-  
-    Assert(0, Characteristic(solutionPoint)>0 );
-  
-    mergedLiftInfo := CREATE_LIFT_INFO@FR(0,0,0,0);
-    
-    mergedLiftInfo := Null@FR;
-
-    minimalPolynomialsData := rec(); 
-    minimalPolynomialsData.dataType:= "PadicLift.MinimalPolynomials";
-    minimalPolynomialsData.unknowns := [] ; # TODO maybe wanna to use a Hashtable in unknowns.
-    minimalPolynomialsData.liftInfo := [] ;
-
-    for unknownIdx in [1..Size(unknowns)] do
-        unknown:=unknowns[unknownIdx];
-      
-        Info(InfoFR,2, Concatenation("------------------lifting variable ", String(unknownIdx),"(",String(Size(unknowns)),") -----------------------") );
-        if Size(ExtRepPolynomialRatFun(unknown))=2 then
-            minPolVar := unknown; # use unknown as variable for minimal polynomial.
-        else
-            # unknown variable is composed and cannot be used as variable for minimal polynomial.
-            minPolVar :=  Indeterminate( Rationals ) ;; #maybe Integers are sufficient.
-        fi;           
-    
-        # heuristic: adjust lift options. TODO: parametrise 'ComputeMinimalPolynomials' with heuristic.
-            optsCopy :=  computeOptions.clone();
-            
-           if not mergedLiftInfo = Null@FR then
-            if optsCopy.initialLiftDepth() < mergedLiftInfo.maxLiftDepth then 
-                optsCopy.setInitialLiftDepth( mergedLiftInfo.maxLiftDepth );
-            fi;
-    
-            if optsCopy.initialLatticeDim()  < mergedLiftInfo.requiredLatticeDimension then 
-                optsCopy.setInitialLatticeDim ( mergedLiftInfo.requiredLatticeDimension);
-            fi;
-          fi;
-        
-        liftResult := ComputeMinimalPolynomialEx@FR( solutionIdeal,  solutionPoint, unknown, minPolVar, optsCopy );
-        if liftResult=fail then
-	        return fail;	
-        fi;
-          if not mergedLiftInfo = Null@FR then
-             mergedLiftInfo := MERGE_LIFT_INFO@FR(  mergedLiftInfo, liftResult.liftInfo );
-         else
-                 mergedLiftInfo :=  liftResult.liftInfo ;
-         fi;
-        Append( minimalPolynomialsData.unknowns , [ [ unknown, liftResult.minPolynomial ] ] );
-        Append( minimalPolynomialsData.liftInfo , [ liftResult.liftInfo ] );
-    
-    od;
-    minimalPolynomialsData.mergedLiftInfo := mergedLiftInfo;
-    return Immutable(minimalPolynomialsData);
-end
-);
-
-
-# todo : ADJUST_PAIRING_TOLERANCE@FR also parametrizable
-# tolerance is after adjusting smaller or equal to the 1/3 of the minimal distance between two roots in rootList
-InstallGlobalFunction( ADJUST_PAIRING_TOLERANCE@FR ,
-function (tolerance, rootList)
-
-    local numRoots, col, row, localTolerance;
-
-    localTolerance := tolerance;
-
-    numRoots := Size(rootList);
-    
-  for row in [1..numRoots] do
-    for col in [(row+1)..numRoots] do
-         if AbsoluteValue(   (rootList[row] - rootList[col]) )/3.0 < localTolerance then 
-            localTolerance := AbsoluteValue(rootList[row] - rootList[col])/3.0;
-        fi;
-    od;
-    od;
-    return localTolerance;
-end
-);
-
-
-# each row should contain at least one entry (exact=false)  or exact one entry (exact=true)
-InstallGlobalFunction( COMPATIBILITY_ROWS_VALID@FR ,
-function(compatibiltyMatrix, exact)
-    local rowSums, entry, l;
-    
-      rowSums := List([1..Size(compatibiltyMatrix)], i-> Number(  compatibiltyMatrix[i] , function(l) return l>0; end ) );
-     for entry in rowSums do
-        if entry>1 and exact then
-            return false;
-        fi;
-        if entry<1 then
-          return false;
-        fi;
-    od;
-    return true;
-end
-);
-
-
-# each row and each column should contain at least one entry (exact=false) or exact one entry (exact=true)
-InstallGlobalFunction(  IS_VALID_ROOT_COMPATIBILITY@FR,
-function( matrix, combinedRootsCount, logger )
-
- local mathchedRoots;
- Assert(0, Characteristic(matrix)=0);
- 
- mathchedRoots := Set( FlattenList@FR(matrix));
- SubtractSet( mathchedRoots, [0] );
- 
- # for each combined root there should be a existing compatibility:
-  if Size(mathchedRoots)<>combinedRootsCount then
-        logger( 0, "--------------root compatibility warning: Size(mathchedRoots)<>combinedRootsCount, problem with error tolerance?" );
-        return  false ;
-    fi;
-
-     if not COMPATIBILITY_ROWS_VALID@FR( matrix, false) or   
-        not COMPATIBILITY_ROWS_VALID@FR( TransposedMat(matrix),false)  then
-             logger(0,"-------------root compatibility warning: compatibility not given;  problem with error tolerance ?");
-        return false ;
-    fi;    
-    return true;
-end
-);
-
-
-InstallGlobalFunction(  COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR ,
-function( firstPolRoots, secondPolRoots, combinedPolRoots, operation, maxTolerance, logger)
-    local localTolerance, numRoots, compatibiltyMatrix, 
-          extendedCompatibilityMatrix, row, col, i, rowSums, entry;
-    localTolerance := maxTolerance;
-    
-    Assert(0, Size(firstPolRoots)>=Size(secondPolRoots) );
-
-    if not Size(firstPolRoots)>=Size(secondPolRoots) or 
-       not Size(combinedPolRoots) = Maximum( Size(firstPolRoots), Size(secondPolRoots) ) then
-          return fail;
-    fi;
-  
-    numRoots := Size(firstPolRoots);
-    compatibiltyMatrix := List( [1..numRoots] ,n-> List([1..Size(secondPolRoots)], l->0)
-                                );
-    extendedCompatibilityMatrix := List( [1..numRoots] ,n-> List([1..Size(secondPolRoots)], l->0)
-                                );
-    
-    # tolerance is after adjusting smaller or equal to the minimal distance between two roots for each  root list
-    localTolerance := ADJUST_PAIRING_TOLERANCE@FR( localTolerance, firstPolRoots );
-    localTolerance := ADJUST_PAIRING_TOLERANCE@FR( localTolerance, secondPolRoots );
-    localTolerance := ADJUST_PAIRING_TOLERANCE@FR( localTolerance, combinedPolRoots );
-
-
-    if IsZero( localTolerance) then
-         logger( 0,   "COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR: pairing tolerance is zero ");
-         return fail;
-    fi;
-   
-    
-    for row in [1..numRoots] do
-    for col in [1..Size(secondPolRoots)] do
-    for i in [1..numRoots] do
-        if  AbsoluteValue( operation (firstPolRoots[row], secondPolRoots[col] )- combinedPolRoots[i] ) <localTolerance then
-            compatibiltyMatrix[row][col] := 1;
-            extendedCompatibilityMatrix[row][col] := i;
-        fi;
-    od;
-    od;
-    od;
-    
-    if  not Rank( compatibiltyMatrix) = Size(secondPolRoots) then 
-        return fail;
-    fi;
-
-    rowSums := List( [1..Size(compatibiltyMatrix)], i-> Sum( compatibiltyMatrix[i]) );
-    for entry in rowSums do
-        if not entry=1 then
-          return fail;
-        fi;
-    od;
-
-    return  compatibiltyMatrix;
-end
-);
-
-
-InstallGlobalFunction(  ComputeRootCompatibilityEx@FR ,
-function( firstPolRoots, secondPolRoots, combinedPolRoots, operation, maxTolerance, logger)
-    local localTolerance,  compatibiltyMatrix, combinedRootsMatched,  
-          row, col, i,   simpleCompatibiltyMatrix;
-          
-    localTolerance := maxTolerance;
-    
-    if  not Size(combinedPolRoots) >= Maximum( Size(firstPolRoots), Size(secondPolRoots) ) then
-            logger( 1, "ComputeRootCompatibility@FR: Error: Size(combinedPolRoots)<Maximum( Size(firstPolRoots), Size(secondPolRoots) )" ); 
-          return fail;
-    fi;
-
-    compatibiltyMatrix := List( [1..Size(firstPolRoots)] ,n-> List([1..Size(secondPolRoots)], l->0)
-                                );
-
-    simpleCompatibiltyMatrix := List( [1..Size(firstPolRoots)] ,n-> List([1..Size(secondPolRoots)], l->0)
-                                );
-    
-    localTolerance := ADJUST_PAIRING_TOLERANCE@FR( localTolerance, firstPolRoots );
-    localTolerance := ADJUST_PAIRING_TOLERANCE@FR( localTolerance, secondPolRoots );
-    localTolerance := ADJUST_PAIRING_TOLERANCE@FR( localTolerance, combinedPolRoots );
-
-
-    if IsZero( localTolerance) then
-        logger( 0,   "ComputeRootCompatibility@FR: error tolerance is zero ");
-        return fail;
-    fi;
-   
-    combinedRootsMatched := List( [1..Size(combinedPolRoots)] ,n->0);
-    for row in [ 1..Size(firstPolRoots)   ] do
-    for col in [ 1..Size(secondPolRoots)  ] do
-    for i   in [ 1..Size(combinedPolRoots)] do
-        if  AbsoluteValue( operation (firstPolRoots[row], secondPolRoots[col] )- combinedPolRoots[i] ) <localTolerance then
-            combinedRootsMatched[i] := 1;
-            compatibiltyMatrix[row][col] := i;
-            simpleCompatibiltyMatrix[row][col] := 1;
-        fi;
-    od;
-    od;
-    od;   
-
-    logger( 2, "compatibiltyMatrix");
-    logger( 2, String(compatibiltyMatrix) );
-
-    if not IS_VALID_ROOT_COMPATIBILITY@FR( compatibiltyMatrix, Size(combinedPolRoots), logger  ) then 
-        logger( 0, "--------------ComputeRootCompatibility@FR:   probably a problem with error tolerance....." );
-        return fail;
-    fi;
-
-    return  compatibiltyMatrix;
-end
-);
-
-
-InstallGlobalFunction(  ComputeRootCompatibility@FR ,
-function( firstPolRoots, secondPolRoots, combinedPolRoots, operation, maxTolerance)
-	return ComputeRootCompatibilityEx@FR(  firstPolRoots, secondPolRoots, combinedPolRoots, 
-	                                   operation, maxTolerance, CREATE_EMPTY_LOGGER_FKT@FR() 
-	                                );
-end
-);
-
- 
-InstallGlobalFunction( IDEAL_POINTS_APPROXIMATION@FR,
-function( minPolyData, approxSolutions, mergedLiftInfo  )
-    local approxSolutionData,indeterminates, errorList,root, error, unknownMinPolyData;
-    
-    approxSolutionData:=rec();
-    approxSolutionData.approxIdealElems  := Immutable(approxSolutions);
-    approxSolutionData.minPolyData := Immutable(minPolyData);
-    approxSolutionData.mergedLiftInfo := Immutable(mergedLiftInfo);
-   
-    
-    errorList := [];
-    indeterminates := List(minPolyData.unknowns, i->i[1] );
-    for unknownMinPolyData in minPolyData.unknowns do
-        for root in  approxSolutions do
-            error := EvalPolynomialTensor@FR( unknownMinPolyData[2],  indeterminates, root);
-            Append(errorList,[ AbsoluteValue( error) ] );
-        od;
-    od;
-    approxSolutionData.residue := Maximum( errorList );
-    
-    approxSolutionData.dataType := Immutable("IdealPointsApprox"); 
-    return Immutable(approxSolutionData);
-end
-);
-
-# todo: it might be that the minimal polynomials are already computed and one does not want to compute them again. redesign.
-InstallGlobalFunction( ComputeApproxIdealPoints@FR ,
-function( inputIdeal,  solutionPoint , opts)
-   
-    local   minimalPolynomialsData, mergedLiftInfo, rootListList, 
-            operation, operationInputList,  operationUsedList, 
-            unknown, newUnknown,   unknownIdx, referenceRoots,  unknownRoots,  
-            preApproxSolutions, tmppreApproxSolutions, 
-            compatibilityResult,  compMatrix,   row, col, entry, entryCopy, 
-            currentCoordinatePaired, idealRing,  indeterminates, approxSolutionData;
-  
-    idealRing  :=  LeftActingRingOfIdeal (inputIdeal);
-    Assert(0, idealRing=RightActingRingOfIdeal (inputIdeal) );
-    indeterminates := IndeterminatesOfPolynomialRing(idealRing);
-
-    
-    minimalPolynomialsData := ComputeMinimalPolynomials@FR( inputIdeal, solutionPoint, indeterminates, opts);
-    if fail=minimalPolynomialsData then
-    	return fail;
-    fi;
-  
-    mergedLiftInfo :=  minimalPolynomialsData.mergedLiftInfo;
-
-    opts.setInitialLiftDepth(  mergedLiftInfo.maxLiftDepth+1 ); # is a heuristic. could be suboptimal for generic problems. 
-    opts.setInitialLatticeDim ( mergedLiftInfo.requiredLatticeDimension) ;
-
-    
-    opts.logger(1, "------------------------pairing part---------------------------") ;
-    if not mergedLiftInfo. requiredLatticeDimension=0  then 
-    
-        # compute roots for each minimalPolynomial ( unknowns[i][2] ) 
-        rootListList := List([ 1..Size(indeterminates)] , unknownIdx->opts.rootCalculator().computeRoots( minimalPolynomialsData.unknowns[unknownIdx][2]) );  
-      
-        operationInputList := List( [1..Characteristic(solutionPoint)-1], fieldNonzeroElem-> function(a,b) return a + fieldNonzeroElem*b; end ) ; 
-        operationUsedList  := []; #debugging
-
-        unknown := indeterminates[1];
-
-        referenceRoots := rootListList[1];
-
-       preApproxSolutions := List( [1..Size(referenceRoots)], n-> [[ referenceRoots[n] ]] );
-
-       for unknownIdx in [2..Size(indeterminates)] do
-        
-            if opts.verbosePairing() then
-                opts.logger(1, Concatenation("unknownIdx", String(unknownIdx)) );
-            fi;
-            currentCoordinatePaired := false;
-            for operation in operationInputList do
-                    newUnknown :=  operation ( unknown , indeterminates[unknownIdx] );
-                    opts.logger(2, Concatenation("newUnknown: ", String(newUnknown  ) ) ) ;
-
-                    opts.setInitialLatticeDim ( 1+ Size(preApproxSolutions) );
-                    
-                    # adjust 'maxLatticeDim': the worst situtation would be if each root in  preApproxSolutions is compatible with each root in 'rootListList[unknownIdx]'
-                    opts.setMaxLatticeDim ( 1+ Size(preApproxSolutions)*Size( rootListList[unknownIdx] ) );
-                  
-                    opts.logger(1, Concatenation("opts.maxLatticeDim: ", String(opts.maxLatticeDim ) ) ) ;
-                    compatibilityResult := ComputeMinimalPolynomials@FR( inputIdeal, solutionPoint, [newUnknown], opts);
-                    
-                    if fail=compatibilityResult then 
-                      continue;  
-                    fi;
-                    
-                    opts.logger(1, Concatenation(" ----------------pairing variable ",String(unknownIdx) ) );
-                    unknownRoots := opts.rootCalculator().computeRoots( compatibilityResult.unknowns[1][2]);
-                
-             
-                    compMatrix := ComputeRootCompatibilityEx@FR( referenceRoots, 
-                                                                   rootListList[unknownIdx] ,  
-                                                                   unknownRoots  ,
-                                                                   operation, 
-                                                                   opts.maxPairingTolerance(), 
-                                                                   opts.logger );
-                    if not fail=compMatrix then
-                            opts.logger(2,  "---------------------------compatibility matrix---------------------------------");
-                            opts.logger(2, String(compMatrix) );
-                        tmppreApproxSolutions := List([ 1..Size(unknownRoots)], n->[] );
-                        
-                        for row in [1..Size(compMatrix) ] do
-                        for col in  [1..Size(compMatrix[1]) ] do
-                            if compMatrix[row][col]>0 then
-                                for entry in preApproxSolutions[row] do
-                                    entryCopy := ShallowCopy(entry);
-                                    Append( entryCopy,[ rootListList[unknownIdx][col] ] );
-                                    Append( tmppreApproxSolutions[ compMatrix[row][col] ], [ entryCopy ]  );
-                                od;
-                            fi;
-                        od;
-                        od;
-                        preApproxSolutions := tmppreApproxSolutions;
-                        Append( operationUsedList, [operation] );       
-                        referenceRoots := unknownRoots;
-                        unknown := newUnknown;
-                        currentCoordinatePaired := true;
-                        mergedLiftInfo := MERGE_LIFT_INFO@FR(  compatibilityResult.mergedLiftInfo , mergedLiftInfo);
-                        opts.logger(1, " ----------------pairing success---------------------------\n");
-                        opts.logger(1, Concatenation("unknownIdx: ", String(unknownIdx) )  );
-                        break;
-                    fi;
-            od;
-            if not currentCoordinatePaired then
-                opts.logger(0, Concatenation("pairing failed for indeterminate ", String(unknownIdx) ));
-                return fail;
-            fi;
-        od;
-    fi;
-    opts.logger (1, " ---------------- All variables paired !---------------------------\n");
-    # todo: save input parameters in the result or not?
-     # debugInfo := Immutable (rec ( operationsUsedForPairing := operationUsedList ) );
-     approxSolutionData := IDEAL_POINTS_APPROXIMATION@FR( minimalPolynomialsData, FlattenList@FR( preApproxSolutions ) , mergedLiftInfo );
-    
-    return approxSolutionData;
-  
-end
-);
-
-
-
-#  COMPUTE_APPROX_HURWITZ_IDEAL_POINTS@FR: 
-# -see also 'ComputeApproxIdealPoints@FR' .
-# may run faster than the generic version, but not succeed for all cases!
-# precondition: assumes that number of solutions of the first indeterminate (Degree of its minimal polymomial) 
-# is the same as the number of   all paired coordinates.
-# thus wont work for each situation, but may work for HurwitzMapSearch problems !
-#
-InstallGlobalFunction( COMPUTE_APPROX_HURWITZ_IDEAL_POINTS@FR,
-function( inputIdeal, solutionPoint , opts)
-
-    local     minimalPolynomialsData, mergedLiftInfo,  pairedRootRootList, rootListList,
-     operation,  operationInputList, operationUsedList,   unknown, unknownIdx, 
-     compatibilityResult,    compMatrix, modDstRootList, roots, approxIdealElems,
-     paired, idealRing, indeterminates, approxSolutionData;
-
-
-    Assert(0, LeftActingRingOfIdeal (inputIdeal)=RightActingRingOfIdeal (inputIdeal) );   
-    idealRing  :=  LeftActingRingOfIdeal (inputIdeal);
-    indeterminates := IndeterminatesOfPolynomialRing(idealRing);
-
-    
-    minimalPolynomialsData := ComputeMinimalPolynomials@FR( inputIdeal, solutionPoint, indeterminates, opts);
-    if minimalPolynomialsData=fail then
-    	Info(InfoFR,1, "failed to compute minimal polynomials");
-    	return fail;
-    fi;
-    mergedLiftInfo :=  minimalPolynomialsData.mergedLiftInfo;
-    
-    #opts.setInitialLiftDepth( mergedLiftInfo.maxLiftDepth );
-    opts.setInitialLiftDepth( mergedLiftInfo.minLiftDepth );
-    opts.setInitialLatticeDim( mergedLiftInfo.requiredLatticeDimension ) ;
-    opts.setMaxLatticeDim ( mergedLiftInfo.requiredLatticeDimension );
-    # opts.setMaxLatticeDim ( mergedLiftInfo.requiredLatticeDimension^2 ); leads to memory error!
-
-    pairedRootRootList := List( [1..Size(indeterminates)], n->0) ;
-
-    if not mergedLiftInfo. requiredLatticeDimension=0  then 
-    
-        # compute roots for each minimalPolynomial ( unknowns[i][2] ) 
-        rootListList := List([ 1..Size(indeterminates)] , unknownIdx->opts.rootCalculator().computeRoots( minimalPolynomialsData.unknowns[unknownIdx][2]) );  
-      
-        pairedRootRootList[1] := rootListList[1];
-
-        # todo: is a+c*b sufficient or is it also required c*a+d*b?
-        operationInputList := List( [1..Characteristic(solutionPoint)-1], pos-> function(a,b) return a+pos*b; end ) ; 
-
-        # for debugging:
-        operationUsedList := [];
-
-       for unknownIdx in [2..Size(indeterminates)] do
-            opts.logger (1, Concatenation(" ---------------- (special) Pairing variable ", String(unknownIdx))) ;
-            paired := false;
-            for operation in operationInputList do
-                    unknown :=  operation ( indeterminates[1] , indeterminates[unknownIdx] );
-                    compatibilityResult := ComputeMinimalPolynomials@FR( inputIdeal,  solutionPoint, [unknown], opts);
-                    if fail=compatibilityResult then 
-                    	continue;
-                    fi;
-             
-               
-                    mergedLiftInfo := MERGE_LIFT_INFO@FR( compatibilityResult.mergedLiftInfo, mergedLiftInfo );
-                    roots := opts.rootCalculator().computeRoots( compatibilityResult.unknowns[1][2]);
-                    if not Size(roots) = Size(rootListList[1]) then 
-                        continue;
-                    fi;
-                 
-                    compMatrix := COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR( rootListList[1], 
-                    							     rootListList[ unknownIdx ],  
-                    							     roots  ,
-                    							     operation, 
-                    							     opts.maxPairingTolerance(),
-                    							     opts.logger  );
-                      if not fail=compMatrix then
-                        if opts.verbosePairing() then
-                             opts.logger (1, "compMatrix");
-                             opts.logger (1, compMatrix);
-                        fi;
-                      
-                        modDstRootList := compMatrix*TransposedMat( [ rootListList[unknownIdx] ] );
-                        Append( operationUsedList, [operation] );       
-                        Assert(0, Size(TransposedMat( modDstRootList ))=1);
-                        pairedRootRootList[unknownIdx] := TransposedMat(modDstRootList)[1];    
-                        opts.logger (1, " ----------------Pairing success---------------------------\n");
-                        opts.logger(1, Concatenation("paired unknownIdx: ", String(unknownIdx) ) ) ;
-                        paired := true;
-                        break;
-                    fi;
-            od;
-            if not paired then
-                Error (Concatenation("pairing failed for unknownIdx ", String(unknownIdx) ));
-            fi;
-        od;
-    fi;
-     opts.logger (1, " ---------------- All variables paired !---------------------------\n");
-    # check:
-    for roots in pairedRootRootList do
-        Assert(0, Size(roots) = mergedLiftInfo.requiredLatticeDimension-1);
-    od;
-    
-    # compose approximate ideal elements from all coordinates. 
-    approxIdealElems := List( [1..Size( pairedRootRootList[1] )], rootIdx-> List( [1..Size(indeterminates)], unknownIdx-> pairedRootRootList[unknownIdx][rootIdx] )
-                );
-                
-    #debugInfo := (rec ( operationsUsedForPairing := operationUsedList ) );
-    approxSolutionData := IDEAL_POINTS_APPROXIMATION@FR( minimalPolynomialsData, Immutable(approxIdealElems), mergedLiftInfo );
-    
-    return approxSolutionData;
-end
-);
-
-##########################################################################################################################################################################
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_LLL", 
-function()
-    local mat,lllResult;
-    mat:=[[1,2],[2,1]];
-    lllResult:= FPLLLReducedBasis(mat);
-    Assert(0, lllResult=[ [ 1, -1 ], [ 1, 2 ] ] );
-end
-);
-
-
-InstallGlobalFunction( CREATE_FINITE_TEST_PROBLEM@FR ,
-function()
-    local  rng, indeterminates,x,y, FZ1,FZ2, ideal, solutionOverFiniteField, expectedResult, problem ;
-
-    rng := PolynomialRing( ZmodnZ(11)  ,["x","y"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-    FZ1 := 33*x^3+19*x^2-81*x-4;
-    FZ2 := y-1;
-    ideal := Ideal(rng,[FZ1,FZ2]);
-    solutionOverFiniteField := [ Z(11)^0, Z(11)^0 ];
-
-    problem := rec();
-    problem.ideal := ideal;
-    problem.indeterminates := indeterminates;   
-    problem.solution := solutionOverFiniteField;      
-    problem.unknowns := indeterminates;
-    return problem;
-end
-);
-
-
-InstallGlobalFunction( CREATE_RATIONAL_TEST_PROBLEM@FR ,
- function()
-    local  rng, indeterminates,x,y, FZ1,FZ2, ideal, solutionOverFiniteField, expectedResult, problem ;
-
-    rng := PolynomialRing( Rationals  ,["x","y"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-    FZ1 := 33*x^3+19*x^2-81*x-4;
-    FZ2 := y-1;
-    ideal := Ideal(rng,[FZ1,FZ2]);
-    solutionOverFiniteField := [ Z(11)^0, Z(11)^0 ];
-
-    problem := rec();
-    problem.ideal := ideal;
-    problem.indeterminates := indeterminates;   
-    problem.solution := solutionOverFiniteField;      
-    problem.unknowns := indeterminates;
-    return problem;
-end
-);
-
-
-InstallGlobalFunction( CREATE_SYMM_TEST_PROBLEM@FR ,
-function()
-    local  rng, indeterminates,x,y, FZ1,FZ2, ideal, solutionOverFiniteField, expectedResult, problem ;
-
-    rng := PolynomialRing( Rationals  ,["y","x"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[2];
-    y := indeterminates[1];
-    FZ1 := 33*x^3+19*x^2-81*x-4;
-    FZ2 := y-1;
-    ideal := Ideal(rng,[FZ1,FZ2]);
-    solutionOverFiniteField := [ Z(11)^0, Z(11)^0 ];
-
-    problem := rec();
-    problem.ideal := ideal;
-    problem.indeterminates := indeterminates;   
-    problem.solution := solutionOverFiniteField;      
-    problem.unknowns := indeterminates;
-    return problem;
-end
-);
-
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_JENKINS_TRAUB_USAGE", 
-function()
-    local rng, indeterminates, x, y, FZ1, bitPrecision, roots, rootCalculator;
-  
-    rng := PolynomialRing( Rationals  ,["x"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-
-      
-    FZ1 := 33*x^3+19*x^2-81*x-4;
-
-    roots:= RootsByJenkinsTraub@FR(FZ1,16);
-    
-    roots:= RootsByJenkinsTraub@FR(FZ1,320);
-    roots:= RootsByJenkinsTraub@FR(FZ1,330);
-
-
-    rootCalculator := CreateJenkinsTraubWrapper@FR(16);
-
-    roots := rootCalculator.computeRoots(FZ1);
-    
-    roots := rootCalculator.computeRoots(FZ1);
-    roots := rootCalculator.computeRoots(FZ1);
-
-end
-);
-
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_LIFT_STEP_1@FR", 
-function()
-    local  rng,jac,ind,x,FZ,ideal,finiteField,solution,gens;
-    rng := PolynomialRing( Rationals  ,["x"] );
-    ind := IndeterminatesOfPolynomialRing(rng);
-    x := ind[1];
-    FZ := 33*x^3+19*x^2-81*x-4;
-    ideal := Ideal(rng,[FZ]);
-    jac := Jacobian@FR( [FZ] ,ind );
-    solution := [Z(11)^0];
-    gens := GeneratorsOfTwoSidedIdeal( ideal );
-    Assert(0, IsZero( Value(FZ,ind,solution)) );
-    Assert(0, IsZero( EvalPolynomialTensor@FR(gens,ind,solution)) );
-    solution := QuadraticLiftStep@FR( gens, jac, ind,  solution);
-    Assert(0, IsZero( EvalPolynomialTensor@FR(gens,ind,solution)) );
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_BLACKBOX_LIFT_STEP_1", 
-function()
-    local  rng,jac,ind,x,FZ,ideal,finiteField,solution,gens, evalIdealGens, jacobianAt;
-    rng := PolynomialRing( Rationals  ,["x"] );
-    ind := IndeterminatesOfPolynomialRing(rng);
-    x := ind[1];
-    FZ := 33*x^3+19*x^2-81*x-4;
-    ideal := Ideal(rng,[FZ]);
-
-    jac := Jacobian@FR( [FZ] ,ind );
-    solution := [Z(11)^0];
-    gens := GeneratorsOfTwoSidedIdeal( ideal );
-
-    Assert(0, IsZero(Value( FZ,ind,solution)) );
-    Assert(0, IsZero(EvalPolynomialTensor@FR( gens,ind,solution)) );
-
-    evalIdealGens := function(point)
-        return EvalPolynomialTensor@FR( gens, ind, point);
-    end;
-
-    jacobianAt := function( point )
-        return EvalPolynomialTensor@FR( jac, ind, point);
-    end;
-
-    solution := BlackBoxQuadraticLiftStep@FR( evalIdealGens, jacobianAt, solution);
-    Assert(0, IsZero(EvalPolynomialTensor@FR(gens,ind,solution)) );
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_LIFT_STEP_2", 
-function()
-    local  problem, jac,solution, gens ;
-   
-    problem :=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-
-    gens := GeneratorsOfTwoSidedIdeal( problem.ideal );
-    jac := Jacobian@FR( gens , problem.indeterminates );
-    Assert(0, IsZero( EvalPolynomialTensor@FR(gens, problem.indeterminates, problem.solution)) );
-    solution := QuadraticLiftStep@FR( gens, jac,  problem.indeterminates, problem.solution);
-    Assert(0, IsZero( EvalPolynomialTensor@FR(gens, problem.indeterminates, solution)) );
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_PADIC_LIFT", 
-function()
-    local  problem, solution, gens;
-
-    problem :=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-    solution := PadicLift@FR( problem.ideal,  problem.solution, 3);
-    gens := GeneratorsOfTwoSidedIdeal( problem.ideal );
-    Assert(0, IsZero(EvalPolynomialTensor@FR(gens, problem.indeterminates, solution)) );
-    # return solution;
-end
-);
-
-
- 
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_BLACKBOX_PADIC_LIFT", 
-function()
-    local  problem, solution, gens, jac, jacobianAt, evalIdealGens;
-
-    problem :=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-    gens := GeneratorsOfTwoSidedIdeal( problem.ideal );
-
-    evalIdealGens := function(point)
-        return EvalPolynomialTensor@FR( gens, problem.indeterminates,  point );
-    end;
-
-    jac := Jacobian@FR( gens , problem.indeterminates );
-
-    jacobianAt := function( point )
-        return EvalPolynomialTensor@FR( jac, problem.indeterminates, point );
-    end;
-
-    solution := BlackBoxPadicLift@FR( evalIdealGens, jacobianAt, problem.solution, 3 );
-   
-    Assert(0, IsZero(evalIdealGens(solution)) );
-    # return solution;
-end
-);
-
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_LLL_REDUCTION", 
-function()
-  local  problem, solution, liftResult, nextLiftResult, gens, reductionOpts;
-
-    problem :=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-     
-    liftResult := PadicLift@FR( problem.ideal,  problem.solution, 3);
-    nextLiftResult := PadicLift@FR( problem.ideal,  problem.solution, 4);
-
-    gens := GeneratorsOfTwoSidedIdeal( problem.ideal );
-    Assert(0, IsZero( EvalPolynomialTensor@FR(gens, problem.indeterminates, liftResult)) );
-    Assert(0, IsZero( EvalPolynomialTensor@FR(gens, problem.indeterminates, nextLiftResult)) );
-    
-    reductionOpts := LiftOptions@FR();
-    LLL_REDUCTION_ATTEMPT@FR ( problem.unknowns[1], problem.indeterminates, liftResult, nextLiftResult, reductionOpts );
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_COMPUTE_MINIMAL_POLYNOMIAL", 
-function()
-  local  problem, options, unknown, minimalPolynomialVariable, liftAndLLLRes;
-   
-    problem :=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-      
-    options := LiftOptions@FR();
-    unknown := problem.indeterminates[1];
-    minimalPolynomialVariable := Indeterminate(Rationals);
-
-    liftAndLLLRes := ComputeMinimalPolynomialEx@FR ( problem.ideal,  problem.solution, unknown,  minimalPolynomialVariable, options );
-
-    unknown := problem.indeterminates[2];
-    liftAndLLLRes := ComputeMinimalPolynomialEx@FR (problem.ideal,  problem.solution, unknown, minimalPolynomialVariable,  options );
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_COMPUTE_MINIMAL_POLYNOMIALS", 
-function()
-  local  indeterminates,x,y,FZ1,FZ2, ideal, solutionOverFiniteField, liftAndLLLOptions,  
-   expectedUnknowns, expectedMergedLiftInfo, problem, unknowns, liftAndLLLRes ;
-
-    liftAndLLLOptions := LiftOptions@FR();
-
-    problem :=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-    x :=  problem.indeterminates[1];
-    y :=  problem.indeterminates[2];
-
-    liftAndLLLRes := ComputeMinimalPolynomials@FR ( problem.ideal, problem.solution,    problem.unknowns ,  liftAndLLLOptions );
-    expectedUnknowns :=   [ [ x, -11*x^2-21*x-1 ], [ y, y-1 ] ];
-    expectedMergedLiftInfo := rec( dataType:="LiftInfo", maxLatticeDimension := 3, maxLiftDepth := 3, requiredLatticeDimension := 3 );
-    
-    Assert( 0, liftAndLLLRes.unknowns=expectedUnknowns );
-    Assert( 0, liftAndLLLRes.mergedLiftInfo=expectedMergedLiftInfo );
-    
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_COMPATIBILITY_ROWS_VALID", 
-function()
-    local matrix;
-	matrix := [[0,1],[2,0],[0,3]];
-	Assert(0, COMPATIBILITY_ROWS_VALID@FR(matrix,false));
-	Assert(0, COMPATIBILITY_ROWS_VALID@FR(matrix,true));
-	matrix := [[2,1],[2,0],[0,3]];
-	Assert(0, COMPATIBILITY_ROWS_VALID@FR(matrix,false));
-	matrix := [[2,1],[2,0],[0,3]];
-	Assert(0, not COMPATIBILITY_ROWS_VALID@FR(matrix,true));
-	matrix := [[2,1],[0,0],[0,3]];
-	Assert(0, not COMPATIBILITY_ROWS_VALID@FR(matrix,true));
-	Assert(0, not COMPATIBILITY_ROWS_VALID@FR(matrix,false));
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_IS_VALID_ROOT_COMPATIBILITY", 
-function()
-
-   local logger,matrix;
-    logger := function(a,b) end;
-   
-    matrix:= [[1,2],[1,4],[5,6]];
-    Assert(0, false=IS_VALID_ROOT_COMPATIBILITY@FR(matrix,6,logger) );
-    matrix:= [[1,2],[3,4],[5,6]];
-    Assert(0, true=IS_VALID_ROOT_COMPATIBILITY@FR(matrix,6,logger) );
-    Assert(0, true=IS_VALID_ROOT_COMPATIBILITY@FR(matrix,6,logger) );
-    
-     matrix:= [[1,0],[3,0],[2,0]];
-     Assert(0, false=IS_VALID_ROOT_COMPATIBILITY@FR(matrix,3,logger) );
-     
-      matrix:= [[1,0],[0,3],[2,0]];
-     Assert(0, true=IS_VALID_ROOT_COMPATIBILITY@FR(matrix,3,logger) );
-  
-end
-);
-
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_COMPUTE_ROOT_COMPATIBILITY", 
-function()
-    local firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts, compatibility;
-    # Probleme, wenn SetFloats nicht aufgerufen worden ist...   
-    SetFloats(MPC,1000);  
-
-    firstPolRoots:=[ 0.03, 34.0, 10.0 ];
-    secondPolRoots:=[ 5.03, 4.0, 1.0 ];   
-    combinedPolRoots := [ 4.03, 11.0, 39.02 ];
-    
-    operation := function(a,b) return a+b; end;
-    opts := LiftOptions@FR();
-    opts.setMaxPairingTolerance ( 0.001 );
-    compatibility := COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR ( firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts.maxPairingTolerance(), opts.logger );
-    Assert(0, compatibility = fail);
-
-    opts:=LiftOptions@FR();
-    opts.setMaxPairingTolerance ( 0.02 );      
-    opts.setVerbosePairing (false );
-    compatibility := COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR ( firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts.maxPairingTolerance(), opts.logger );
-    Assert(0, compatibility= [[ 0, 1, 0 ], [ 1, 0, 0 ], [ 0, 0, 1 ] ] );
-
-    firstPolRoots  := [  4.0, 10.0 ];
-    secondPolRoots := [ 5.0 ];   
-    combinedPolRoots := [ 9.0, 15.0 ];
-
-    compatibility := ComputeRootCompatibilityEx@FR ( firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts.maxPairingTolerance(), opts.logger );
-    Assert(0, compatibility = [[1],[2]]);
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_COMPUTE_APPROX_IDEAL_POINTS", 
-function()
-    local TestHelper;
-    TestHelper := 
-    function(problem)
-        local    opts, gens, result, errorTolerance, evaluation, evaluationAbs, max , root;
-        
-        opts := LiftOptions@FR();
-
-        result := ComputeApproxIdealPoints@FR( problem.ideal,   problem.solution, opts);
-
-        gens := GeneratorsOfTwoSidedIdeal( problem.ideal );
-
-        errorTolerance := 1.e-14;
-
-        for root in result.approxIdealElems do
-            evaluation := EvalPolynomialTensor@FR( gens,problem.indeterminates, root ) ;
-            #evaluationAbs := List([1..Size(evaluation)], n-> AbsoluteValue( evaluation[n]) );
-            evaluationAbs := List( evaluation, n-> AbsoluteValue( n) );
-            max := Maximum(evaluationAbs);
-            Assert(0, max<errorTolerance );
-        od;
-    end;
-    # problem:=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-    TestHelper(  CREATE_RATIONAL_TEST_PROBLEM@FR() );
-    TestHelper(  CREATE_SYMM_TEST_PROBLEM@FR() );
-end
-);
-
-
-
-InstallGlobalRecordFunction@FR ( ["@PadicLift","Tests"], "TEST_COMPUTE_HURWITZ_APPROX_IDEAL_POINT", 
-function()
-    local   problem, opts, gens, result, errorTolerance, evaluation, evaluationAbs, max, root ;
-
-    problem :=  CREATE_RATIONAL_TEST_PROBLEM@FR();
-    
-    opts := LiftOptions@FR();
-
-    result := COMPUTE_APPROX_HURWITZ_IDEAL_POINTS@FR(problem.ideal, problem.solution, opts);
-
-    gens := GeneratorsOfTwoSidedIdeal( problem.ideal );
-
-    errorTolerance := 1.e-14;
-
-    for root in result.approxIdealElems do
-        evaluation := EvalPolynomialTensor@FR( gens,problem.indeterminates, root ) ;
-        evaluationAbs := List( evaluation, n-> AbsoluteValue( n) );
-        max := Maximum(evaluationAbs);
-        Assert(0, max<errorTolerance );
-    od;
-end
-);
-
-
-
-# todo: depends on package 'float' - write this test elsewhere !
-InstallGlobalRecordFunction@FR (["@PadicLift","Tests"], "TEST_COERCE_POLYNOMIAL_TO_COMPLEX_RING",
- function()
-    local rng, indeterminates, x, pol, dstrng, coercedPol,dstInd, expectedResult;
-    rng := PolynomialRing(Rationals,1);
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    pol := x^+2+3;
-
-    dstrng := PolynomialRing( MPC_PSEUDOFIELD,1 ); # 1 indeterminate
-    
-    coercedPol := CoercePolynomialTensor@FR(pol, dstrng);
-    
-    dstInd := IndeterminatesOfPolynomialRing(dstrng);
-    expectedResult := dstInd[1]^2+3.0_c;
-    Assert(0, coercedPol=expectedResult);
-    
-end
-);
-
-
-
- 
-InstallGlobalRecordFunction@FR (["@PadicLift"], "CreateTestString",
-function(prefix)
-    return @FR@Utils.Internal.CreateTestString("@PadicLift.Tests", prefix);
-end
-);
-
-
-
diff --git a/sandbox/hurwitz.kroeker/gap/utils.gd b/sandbox/hurwitz.kroeker/gap/utils.gd
deleted file mode 100644
index 59d6490..0000000
--- a/sandbox/hurwitz.kroeker/gap/utils.gd
+++ /dev/null
@@ -1,208 +0,0 @@
-#############################################################################
-##
-#W hurwitzUtils                                                  Jakob Kröker
-##                                                               
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2012, Laurent Bartholdi
-##
-#############################################################################
-##
-##
-##  Implements following set of functions:
-##
-##  -list operation (flatten list)
-##  -get/set polynomial coefficients
-##  -evaluate polynomials
-##  -derive polynomial lists (jacobian) 
-##  -coercing (nested lists) of polynomials and scalars to different rings 
-##   or fields.
-##  -utils for factoring univariate polynomials
-##
-##############################################################################
-
-# todo : define DeclareGlobalRecordFunction, DeclareGlobalRecordOperation!
-
-
-BindGlobal("@FR@Utils" , rec() ) ;
-DeclareGlobalFunction( "@FR@Utils.");
-@FR@Utils.Tests    := rec();
-@FR@Utils.Internal := rec();
-
-
-# todo : replace Null@FR with Null@FR. 
-# Introduce Null@FR to  indicate an uninitialized pointer/variable
-if not IsBound( Null@FR ) then
-    #BindGlobal("Null@FR", MakeImmutable( []) );
-    BindGlobal("Null@FR", MakeImmutable( rec(value := "uninitialized data" ) ));
-fi;
-
-Assert( 0, false = IsMutable(Null@FR) );
-
-
-
-
-DeclareGlobalFunction("InstallGlobalRecordFunctionOrMethod@FR");
-DeclareGlobalFunction("InstallGlobalRecordFunction@FR");
-DeclareGlobalFunction("InstallGlobalRecordFunctionEx@FR");
-DeclareGlobalFunction("ReInstallGlobalRecordFunction@FR");
-
-DeclareGlobalFunction("InstallGlobalRecordOperation@FR");
-DeclareGlobalFunction("ReInstallGlobalRecordOperation@FR");
-
-
-DeclareGlobalFunction("InstallGlobalRecordMethodEx@FR");
-DeclareGlobalFunction("InstallGlobalRecordMethod@FR");
-DeclareGlobalFunction("InstallGlobalRecordOtherMethod@FR");
-
-
-
-#################################### LIST OPERATIONS ##################################
-
-# flattens a list inplace. Example: [ [1,[2] ],[1] ] changes to [1,[2], 1] changes to [1,2,1] .
-DeclareOperation("FlattenList@FR", [ IsList ] );
-@FR@Utils.FlattenList:=FlattenList@FR;
-
-DeclareOperation("FirstElement@FR", [ IsList ] );
-@FR@Utils.FirstElement:=FirstElement@FR;
-
-DeclareOperation("LastElement@FR", [ IsList ] );
-@FR@Utils.LastElement:=LastElement@FR;
-
-
-
-#################################### POLYNOMIAL DIFFERENTIATION ############################
-
-
-# Jacobian: compute ( d [fktlist_i] / d [indeterminants_j] ). Parameters:  ( fktlist, indeterminants )
-# todo: maybe add indeterminate information to the returned result.
-DeclareGlobalFunction("Jacobian@FR");
-@FR@Utils.Jacobian:=Jacobian@FR;
-
-#################################### GET/SET COEFFICIENTS ##################################
-
-
-# checks if an object is a monomial.
-# Note: existing operation 'IsMonomial' probably means 'IsMonomialGroup'
-DeclareOperation( "IsMonomial@FR",  [IsObject] ); 
-# DeclareProperty( "IsMonomial@FR",  IsObject );
-@FR@Utils.IsMonomial:=IsMonomial@FR;
-
-# get coefficient for a specified monomial. Parameters: ( polynomial, monomial )
-DeclareOperation( "MonomialCoefficient@FR", [ IsPolynomial, IsPolynomial] );
-@FR@Utils.MonomialCoefficient:=MonomialCoefficient@FR;
-
-# get coefficients [of specific monomials]. Parameters: ( polynomial, [monomials] )
-# To get all nonzero coefficients just omit the second parameter.
-# return value: coefficients
-DeclareOperation("Coefficients@FR", [ IsPolynomial, IsList ] );
-@FR@Utils.Coefficients:=Coefficients@FR;
-
-# return value: [ coefficients, corresponding monomials ]
-DeclareOperation("CoefficientsEx@FR", [ IsPolynomial, IsList ] );
-@FR@Utils.CoefficientsEx:=CoefficientsEx@FR;
-
-#################################### EVALUATE POLYNOMIALS #################################
-
-# substitute indeterminates in the tensor by corresponding values. 
-#Parameter: (tensor, indeterminates, values)
-DeclareGlobalFunction("EvalPolynomialTensor@FR");
-@FR@Utils.EvalPolynomialTensor:=EvalPolynomialTensor@FR;
-
-DeclareGlobalFunction("SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR");
-@FR@Utils.SUBSTITUTE_POLYNOMIAL_COEFFICIENTS:=SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR;
-
-#################################### POLYNOMIAL AND SCALAR COERCION ########################
-
-# note: coercion works only for some special cases and therefore  should probably not be exported. 
-# (swith naming to all upper case? )
-
-# coerce a scalar to a specific ring
-#parameters: (scalar, destRing)
-DeclareGlobalFunction("CoerceScalar@FR");
-@FR@Utils.CoerceScalar:=CoerceScalar@FR;
-
-# coerce a polynomial to a specific ring
-# parameters: (polynomial, destRing)
-DeclareGlobalFunction( "CoercePolynomial@FR" );
-@FR@Utils.CoercePolynomial:=CoercePolynomial@FR;
-
-# coerce a nested list of polynomials or scalars to a specific ring
-# parameters: ( tensor,  destRing ). 
-# limitations: accepts only scalars or polynomial as basic elements.
-DeclareGlobalFunction( "CoerceTensor@FR" );
-@FR@Utils.CoerceTensor:=CoerceTensor@FR;
-
-DeclareSynonym("PromoteScalarTensor@FR", CoerceTensor@FR);
-DeclareSynonym("CoerceScalarTensor@FR", CoerceTensor@FR);
-DeclareSynonym("CoercePolynomialTensor@FR", CoerceTensor@FR);
-@FR@Utils.PromoteScalarTensor:=PromoteScalarTensor@FR;
-@FR@Utils.CoerceScalarTensor:=CoerceScalarTensor@FR;
-@FR@Utils.CoercePolynomialTensor:=CoercePolynomialTensor@FR;
-
-
-#################################### POLYNOMIAL PROPERTIES ##################################
-
-DeclareOperation( "CountPolynomialVariables@FR", [IsPolynomial] );
-DeclareSynonym( "IndeterminateNumber@FR", CountPolynomialVariables@FR);
-DeclareSynonym( "NumberOfIndeterminates@FR", CountPolynomialVariables@FR);    
-
-#DeclareSynonym( "IndeterminateNumber@FR",  IndeterminateNumberOfUnivariateRationalFunction);
-@FR@Utils.IndeterminateNumber:=IndeterminateNumber@FR;
-@FR@Utils.CountPolynomialVariables:=CountPolynomialVariables@FR;
-
-
-#DeclareGlobalFunction("Degree@FR");
-#@FR@Utils.Degree:=Degree@FR;
-
-################################# POLYNOMIAL FACTORS AND PRODUCTS ##########################
-
-
-DeclareOperation("IsPower@FR", [IsList] );
-@FR@Utils.IsPower:=IsPower@FR;
-
-# Parameters: (base, exponent)
-DeclareGlobalFunction( "CreatePower@FR" );
-@FR@Utils.CreatePower:=CreatePower@FR;
-
-# todo: introduce 'Power' and 'Product' objects 
-
-# note:  in following power means a pair [ base, exponent ].
-#        and a product means a product (list) of powers.
- 
-# return distinct monic factors (no constants) of a polynomial.
-DeclareOperation("DistinctMonicFactors@FR", [IsPolynomial ]);
-@FR@Utils.DistinctMonicFactors:=DistinctMonicFactors@FR;
-
-# computes the value of a product
-DeclareGlobalFunction("PRODUCT_VALUE@FR");
-@FR@Utils.PRODUCT_VALUE := PRODUCT_VALUE@FR;
-
-
-# factors a homogenized univariate polynomial over rationals or finite fields into  power factors with distinct bases. 
-DeclareOperation("UNIQUE_PRODUCT_HOMOGENIZED@FR", [ IsPolynomial ]);
-
-# factors an univariate polynomial over rationals or finite fields into  power factors with distinct bases. 
-# see also 'Factors'
-DeclareOperation("UNIQUE_PRODUCT@FR", [ IsPolynomial ]);
-@FR@Utils.UNIQUE_PRODUCT := UNIQUE_PRODUCT@FR;
-
-
-
-
-DeclareOperation("UNIQUE_PRODUCT_1@FR",[ IsPolynomial ]);  # just a different implementation.
-
-
-# removes constant factors from a list of powers.
-DeclareGlobalFunction("REMOVE_CONSTANT_FACTORS@FR");  
-@FR@Utils.REMOVE_CONSTANT_FACTORS := REMOVE_CONSTANT_FACTORS@FR;
-
-# sort a list of powers   by exponent desc
-DeclareGlobalFunction("SORT_POWERS_BY_EXPONENT@FR");
-@FR@Utils.PRODUCT_VALUE := PRODUCT_VALUE@FR;
-
-
-
-
-#E hurwitzUtils.gd . . . . . . . . . . . . . . . . . . . . . . . . . . . .ends here
diff --git a/sandbox/hurwitz.kroeker/gap/utils.gi b/sandbox/hurwitz.kroeker/gap/utils.gi
deleted file mode 100644
index 2ed2c7b..0000000
--- a/sandbox/hurwitz.kroeker/gap/utils.gi
+++ /dev/null
@@ -1,1554 +0,0 @@
-#############################################################################
-##
-#W hurwitzUtils                                                  Jakob Kröker
-##                                                               
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2012, Laurent Bartholdi
-##
-#############################################################################
-##
-##
-##  Implements following set of functions:
-##
-##  -list operation (flatten list)
-##  -get/set polynomial coefficients
-##  -evaluate polynomials
-##  -derive polynomial lists (jacobian) 
-##  -coercing (nested lists) of polynomials and scalars to different rings 
-##   or fields.
-##  -utils for factoring univariate polynomials
-##
-##############################################################################
-
-# dependencies: package 'float'!
-
-
-# TODO: GF(11) vs GF(121) vs ZmodnZ(121) : what are the type of its elements  and how to check for it?
-
-
-# todo: update documentation...
-# adds a function to a global record structure described by a list 'recordstructure' of nesting record names.
-# Example: 
-# if recordstructure[1] is a global record structure, 
-# installs recordstructure[1].recordstructure[2]. ... recordstructure[i].functionName := functionRef
-# in case functionName is a new record entry.
-
- # todo: get rid of duplicate code (see also InstallGlobalRecordFunctionEx) 
- InstallGlobalFunction( InstallGlobalRecordFunctionOrMethod@FR,
-function( recordstructure, functionName, comments, params, functionRef, installFkt, reinstall)
-
-    local headRec, currentRec, name, i,fullName, globalName;
-    
-    Assert(0, Size( recordstructure)>0);
-      
-    Assert(0, IsBoundGlobal( recordstructure[1]) );
-
-    fullName := Concatenation(recordstructure[1],"\.");
-    headRec := ShallowCopy( ValueGlobal( recordstructure[1] ) );
-    currentRec := headRec;
-    Assert(0, IsRecord(currentRec) );
-    for i in [2..Size(recordstructure)] do
-        name := recordstructure[i];
-        Assert(0, name in RecNames( currentRec ) );
-        currentRec.(name) := ShallowCopy(currentRec.(name));
-        currentRec := currentRec.(name);
-         Assert(0, IsRecord(currentRec) );
-        fullName := Concatenation(fullName,name,"\.");
-    od;
-   
-    if functionName in RecNames(currentRec) then 
-        if reinstall then
-        
-             if (installFkt=InstallMethod or installFkt=InstallOtherMethod) then 
-                Error("cannot reinstall method for an operation");
-             else
-                currentRec.(functionName) := functionRef;
-             fi;
-         
-        else # not reinstall
-            if not IsOperation( currentRec.(functionName) ) then 
-               Error(Concatenation( "function '", functionName, "' is already installed!" ));
-            else       #  is operation 
-
-              if not  (installFkt=InstallMethod or installFkt=InstallOtherMethod) then
-                Error("trying overwrite an operation");
-              else
-                installFkt( currentRec.(functionName), comments, params, functionRef );
-              fi;
-            fi;
-        fi;
-    fi;
-     if not functionName in RecNames(currentRec) then
-       if (installFkt=InstallMethod or installFkt=InstallOtherMethod) then
-            Error(Concatenation( "operation '", functionName, "' is not installed!" ));
-        else
-            currentRec.(functionName) := functionRef;
-        fi;
-    fi;
-    
-    fullName := Concatenation( fullName, functionName );
-    #if IS_READ_ONLY_GLOBAL(fullName) then 
-    #    MakeReadWriteGlobal( fullName );
-    #fi;
-    #if IsBoundGlobal(fullName) then 
-    #    UnbindGlobal(  fullName ) ;    
-    #fi;
-    #
-    #BindGlobal( fullName, currentRec.(functionName) ) ;
-    
-    #MakeReadOnlyGlobal(fullName);
-    globalName := Concatenation( functionName,  recordstructure[1] );
-    Assert(0, Size( recordstructure[1])>0);
-    if not recordstructure[1][1]='@' then 
-        globalName := Concatenation( functionName, "@", recordstructure[1] );
-    fi;
-    if IS_READ_ONLY_GLOBAL(globalName) then 
-      MakeReadWriteGlobal( globalName );
-    fi;
-    if IsBoundGlobal(globalName) then 
-        UnbindGlobal(  globalName ) ;    
-    fi;
-    BindGlobal( globalName ,  currentRec.(functionName) ) ;
-    #MakeReadOnlyGlobal(globalName);
-    SetName(currentRec.(functionName),fullName );
-   
-    MakeReadWriteGlobal( recordstructure[1] );
-    UnbindGlobal( recordstructure[1] );
-    MakeImmutable( headRec );
-    BindGlobal( recordstructure[1], headRec);
-   return;
-end
-);
-
-
- InstallGlobalFunction( InstallGlobalRecordMethod@FR,
- function( recordstructure, functionName, comments, params, functionRef)
-     InstallGlobalRecordFunctionOrMethod@FR( recordstructure, functionName, comments, params, functionRef, InstallMethod, false);
- end
-);
-
-
- InstallGlobalFunction( InstallGlobalRecordOtherMethod@FR,
- function( recordstructure, functionName, comments, params, functionRef)
-     InstallGlobalRecordFunctionOrMethod@FR( recordstructure, functionName, comments, params, functionRef, InstallOtherMethod,false);
- end
-);
-
-
-InstallGlobalFunction( InstallGlobalRecordFunctionEx@FR,
-function( recordstructure, functionName, functionRef, reinstall)
-    local installFkt;
-    installFkt := function( variable, comments, params, functionRef, reinstall )
-        variable := functionRef;
-    end;
-    InstallGlobalRecordFunctionOrMethod@FR( recordstructure, functionName, "",[], functionRef, installFkt, reinstall);
-end
-);
-
-
-
-InstallGlobalFunction( InstallGlobalRecordFunction@FR,
-function( recordstructure, functionName, functionRef)
-     Assert(0, not IsOperation(functionRef) );
-     InstallGlobalRecordFunctionEx@FR( recordstructure, functionName,  functionRef,false);
-end
-);
-
-InstallGlobalFunction( InstallGlobalRecordOperation@FR,
-function( recordstructure, functionName, parameterTypes)
-     InstallGlobalRecordFunctionEx@FR( recordstructure, functionName,  NewOperation(functionName, parameterTypes), false);
-end
-);
-
-InstallGlobalFunction( ReInstallGlobalRecordFunction@FR,
-function( recordstructure, functionName, functionRef)
-    Assert(0, not IsOperation(functionRef) );
-    InstallGlobalRecordFunctionEx@FR( recordstructure, functionName,  functionRef, true);
-end
-);
-
-
-InstallGlobalFunction( ReInstallGlobalRecordOperation@FR,
-function( recordstructure, functionName, parameterTypes)
-    InstallGlobalRecordFunctionEx@FR( recordstructure, functionName,  NewOperation(functionName, parameterTypes),true);
-end
-);
-
-
-
- 
-  InstallGlobalRecordOperation@FR ( ["@FR@Utils"], "Degree", 
- [IsPolynomial] 
- );
- 
-#InstallOtherMethod( Degree , 
- InstallGlobalRecordMethod@FR ( ["@FR@Utils"], "Degree",
-"get degree of a multivariate polynomial", [IsPolynomial], 
- function( polynomial )
-    
-    local   coeffData, monomData, degree,monomialDegrees, pos, i;
-
-    coeffData := ExtRepPolynomialRatFun(polynomial);
-    monomialDegrees := List([1..Size(coeffData)/2]);
-    for pos in [1..Size(coeffData)/2] do
-        degree := 0;
-	    if not IsZero(coeffData[pos*2]) then 
-	            monomData := coeffData[pos*2-1];
-	            for i in [1..Size(monomData)/2] do
-	                degree:=degree+monomData[i*2];
-	            od;
-	    fi;
-        monomialDegrees[pos]:=degree;
-    od;
-   return Maximum(monomialDegrees);
-end
-);
-
-
-
-
-###############################################################################################################
-
-
-InstallMethod( FlattenList@FR, "remove the top level nesting ", [IsList], 
-function(list)
-    local result, entry;
-    
-    Assert(0, IsList(list));
-    
-    result := [];
-    for entry in list do
-        if IsList(entry) then
-        Append(result,entry);
-        else
-            Append( result, [entry] );
-        fi;
-    od;
-    list := result;
-    return list;
-end
-);
-
-InstallMethod( FirstElement@FR, "get first list element ", [IsList], 
-function(list)
-    if Size(list)=0 then 
-        return fail;
-    fi;
-    return list[1];
-end
-);
-
-InstallMethod( LastElement@FR, "get last list element ", [IsList], 
-function(list)
-    if Size(list)=0 then 
-        return fail;
-    fi;
-    return list[Size(list)];
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_FLATTEN_LIST", 
-function()
-	Assert(0, [] = FlattenList@FR( [] ));
-	Assert(0, [1,2,1] = FlattenList@FR( [1,[2,1]] ));
-	Assert(0, [1,2,[1]] = FlattenList@FR( [1,[2,[1]]] ));
-	Assert(0, [[1],1] = FlattenList@FR( [[],[[1]],1] ));
-end
-);
-
-
-#################################### GET/SET COEFFICIENTS ################################################################
-
-
-InstallMethod( IsMonomial@FR, "", [IsObject], 
-function (monomial)
-	local  monomData;
-	if not IsPolynomial (monomial) then 
-		return false;
-	fi;
-	monomData := ExtRepPolynomialRatFun(monomial);
-	if Size(monomData) <>2 or not IsOne(monomData[2]) then
-		return false;
-	fi;
-	return true;
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_IS_MONOMIAL", 
-function()
-    local rng, indet, x, y;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x","y"] );
-    indet  := IndeterminatesOfPolynomialRing(rng);
-    x := indet[1];
-    y := indet[2];
-    Assert(0, IsMonomial@FR(x) );
-    Assert(0, IsMonomial@FR(x*y) );
-    Assert(0, not IsMonomial@FR(2*x*y) );
-    Assert(0, not IsMonomial@FR(x+y) );
-    Assert(0, not IsMonomial@FR(3) );
-    Assert(0, not IsMonomial@FR(rng) );
-end);
-
-
-InstallMethod( MonomialCoefficient@FR , 
-"get coefficient for a given monomial of an polynomial ", [ IsPolynomial, IsPolynomial ],
- function( polynomial, monomial )
-    
-    local  monomData, coeffData, pos;
- 
-    if not IsMonomial@FR ( monomial ) then 
-    	Error( "MonomialCoefficient: second parameter is not a monomial !" );
-    fi;
-    
-    monomData := ExtRepPolynomialRatFun(monomial);
-
-    coeffData := ExtRepPolynomialRatFun(polynomial);
-    for pos in [1..Size(coeffData)/2] do
-        if coeffData[pos*2-1]=monomData[1] then
-            return coeffData[pos*2];
-        fi;
-    od;    
-   
-    return Zero( CoefficientsFamily(FamilyObj(polynomial)) ) ;
-end
-);
-
-
-# get coefficients of specific monomials.
-# todo:  implementation is not efficient
-InstallOtherMethod( Coefficients@FR, 
-" get coefficients of specified monomials", [IsPolynomial, IsList],
- function( polynomial, monomials )
-     local monomial, monomialCoefficient, coefficients;
-   
-     # checking:
-      for monomial in monomials do     
-      	 if not IsMonomial@FR(monomial) then
-      	 	Error( "getCoefficients: second parameter has to be a monomial list !" );
-      	 fi;
-      od;    
-   
-    coefficients := [];
-    for monomial in monomials do
-        monomialCoefficient := MonomialCoefficient@FR ( polynomial, monomial );
-        Append( coefficients, [ monomialCoefficient ] );
-    od;
-    return coefficients;
-end
-);
-
-InstallMethod( CoefficientsEx@FR, 
-" get coefficients of specified monomials", [IsPolynomial, IsList],
- function( polynomial, monomials )
-    return [ Coefficients@FR( polynomial, monomials), monomials];
- end
- );
-
-
-InstallOtherMethod( CoefficientsEx@FR , 
-"get nonzero coefficients and corresponding monomial list for a polynomial", [IsPolynomial], 
- function( polynomial )
-    
-    local  coeffList, coeffData, pos, monomialList, idCoeff;
-    coeffList := [];
-    monomialList := [];
-
-    idCoeff := One( CoefficientsFamily( FamilyObj(polynomial) ) );
-    coeffData := ExtRepPolynomialRatFun(polynomial);
-    for pos in [1..Size(coeffData)/2] do
-	if not IsZero(coeffData[pos*2]) then 
-	        Append( coeffList, [ coeffData[pos*2] ]);
-	        Append( monomialList, [ PolynomialByExtRep( FamilyObj( polynomial), [ coeffData[pos*2-1] , idCoeff ]   ) ]    );
-	fi;
-    od;
-   return [ coeffList, monomialList ];
-end
-);
-
-
-
-
-InstallOtherMethod( Coefficients@FR, 
-" get coefficients of specified monomials", [IsPolynomial],
- function( polynomial )
-    return CoefficientsEx@FR( polynomial)[1] ;
- end
- );
-
-
-#InstallGlobalFunction( TEST_MONOMIAL_COEFFICIENT@FR ,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_MONOMIAL_COEFFICIENT", 
- function()
-    local rng, indeterminates,x,y,polynomial;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x","y"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-    polynomial := (x^4-4)^3*(4*y^2+2);
-    Assert(0, Z(11)^4 = MonomialCoefficient@FR(polynomial, x^4*y^2));
-    Assert(0, Zero(Z(11)) = MonomialCoefficient@FR(polynomial, x^42*y^2));
-    Assert(0, Z(11)^2 = MonomialCoefficient@FR(polynomial, x^0*y^0));
-end
-);
-
-
-#InstallGlobalFunction( TEST_COEFFICIENTS@FR ,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_COEFFICIENTS", 
-function()
-    local rng, indeterminates,x,y,polynomial;
-     rng := PolynomialRing( ZmodnZ(11)  ,["x","y"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-    polynomial := (x^4-4)^3*(4*y^2+2);
-    Assert(0, [Z(11)^4, Zero(Z(11))] =Coefficients@FR(polynomial, [x^4*y^2, x^42*y^2]));    
-
-end
-);
-
-
-#################################### POLYNOMIAL DIFFERENTIATION ################################################################
-
-# Jacobian: compute ( d[fktlist_i] / d[indeterminants]_j )
-InstallGlobalFunction( Jacobian@FR, 
-function( fktlist, indeterminants )
-    local cols, mat, row, col, fkt;
-    if not  IsList(fktlist) then
-	    Error("Jacobian: first parameter has to be a list of polynomials! \n");
-    fi;
-    if not  IsList(indeterminants) then
-	    Error("Jacobian: second parameter has to be a list of indeterminates! \n");
-    fi;
-    
-    for fkt in fktlist do
-    	if not IsPolynomial(fkt) then
-    		Error("Jacobian: first parameter has to be a list of polynomials! \n");
-    	fi;
-    od;
-    
-    mat:=   List( [1..Size(fktlist)], n->
-                                        List( [1..Size(indeterminants)], l->0) 
-                );
-    for row in [1..Size(fktlist)] do 
-        for col in  [1..Size( indeterminants)] do 
-            mat[row][col] := Derivative( fktlist[row], indeterminants[col] ) ;
-        od;
-    od;
-    return mat;
-end
-);
-
-
-#InstallGlobalFunction(TEST_JACOBIAN@FR, 
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_JACOBIAN", 
-function() 
-    local rng, ind,x,y,scalar,pol,jacobian;
-    rng := PolynomialRing(Rationals,2);
-    ind := IndeterminatesOfPolynomialRing(rng);
-    x := ind[1];
-    y := ind[2];
-    scalar:=5/3;
-    pol := scalar*x;
-    
-    jacobian := Jacobian@FR( [pol,y^2], ind);
-    Assert(0, jacobian = [ [Derivative(pol,x), Derivative(pol,y)], [Derivative(y^2,x),Derivative(y^2,y)] ] );
-end
-);
-
-
-#################################### COERCE POLYNOMIALS AND SCALARS #########################################################
-
-InstallGlobalFunction( CoerceScalar@FR ,
-function(scalar, dstRing)
-    local intVal, coercedVal;
-
-    coercedVal :=   scalar ;
-    if Int(scalar)* One(scalar)=scalar then 
-        coercedVal := Int(scalar) ;
-         if Characteristic( scalar )>0 and Int(coercedVal)>Characteristic( scalar )/2 then
-            coercedVal := coercedVal-Characteristic( scalar );
-         fi;
-        coercedVal := coercedVal* One(dstRing);
-    fi;
-    coercedVal := coercedVal * One(dstRing);
- 
-    if   IsRing(dstRing) then 
-        Assert(0, coercedVal in dstRing);
-    fi;
-    if  IsFamily(dstRing) then
-        Assert(0, FamilyObj(coercedVal) = dstRing );
-    fi;
-    return coercedVal;
-end
-);
-
-
-#InstallGlobalFunction( TEST_COERCE_SCALAR@FR ,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_COERCE_SCALAR", 
-function()
-    local scalar, dstRing;
-    scalar := 1/3;
-    dstRing := Integers;
-
-    # CoerceScalar@FR( scalar,dstRing ); # TODO: fails and should fail!, but how it can be used in a test ?
-
-    dstRing := GF(11);
-    CoerceScalar@FR( scalar,dstRing ); #ok.
-
-    dstRing := ZmodnZ(11);
-    Assert(0, One(dstRing)*scalar=  CoerceScalar@FR( scalar,dstRing )); #ok.
-
-    scalar := 23;
-    dstRing := Integers;
-
-     Assert(0, One(dstRing)*scalar=  CoerceScalar@FR( scalar,dstRing )); #ok.
-
-    dstRing := GF(11);
-     Assert(0, One(dstRing)*scalar=  CoerceScalar@FR( scalar,dstRing )); #ok.
-
-    dstRing := ZmodnZ(121);
-   Assert(0, One(dstRing)*scalar=  CoerceScalar@FR( scalar,dstRing )); #ok.
-    
-end
-);
-
-
-# note: will not work for Galois fields and floats!
-# has some problems for iterative dstRings...
-InstallGlobalFunction( CoercePolynomial@FR ,
-function( polynomial, dstRing )
-   local pos, intVal,fam,  polRep, polRepCopy, coercedPol, coercedVal, scalar;
-
-  fam := ElementsFamily(FamilyObj( dstRing ));
-
-   polRep := ExtRepPolynomialRatFun( polynomial );
-    polRepCopy := ShallowCopy(polRep);
-    for pos in [1..Size(polRep)/2] do
-        if IsPolynomial( polRepCopy[2*pos]) and IsPolynomialRing(dstRing) then
-            polRepCopy[2*pos] := CoercePolynomial@FR(  polRep[2*pos],  CoefficientsRing(dstRing) )  ;    
-        else
-	         polRepCopy[2*pos] := CoerceScalar@FR(  polRep[2*pos],  CoefficientsRing(dstRing) )  ;      
-        fi;
-    od;        
-    coercedPol :=  PolynomialByExtRep(fam, polRepCopy);
-    return coercedPol;
-end
-);
-
-
-
-
-#InstallGlobalFunction( TEST_COERCE_POLYNOMIAL@FR ,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_COERCE_POLYNOMIAL", 
-function()
-      local rng, ind, x, pol, dstRng, baseField, scalar, dstRing, coercedPol, dstInd, expectedResult;
-
-    rng := PolynomialRing(Rationals,1);
-    ind:=IndeterminatesOfPolynomialRing(rng);
-    x := ind[1];
-    scalar:=5/3;
-    pol := scalar*x;
-
-    baseField := ZmodnZ(11);
-    dstRng := PolynomialRing(baseField ,1);
-    coercedPol := CoercePolynomial@FR(pol, dstRng);
-    dstInd := IndeterminatesOfPolynomialRing(dstRng);
-    expectedResult := dstInd[1]*Z(11)^6;
-    Assert(0, coercedPol=expectedResult);
-
-    # CoerceScalar@FR( scalar,dstRng ); #ok.
-
-    baseField := ZmodnZ(121);
-    dstRng := PolynomialRing(baseField ,1);
-    coercedPol := CoercePolynomial@FR(pol, dstRng);
-    dstInd := IndeterminatesOfPolynomialRing(dstRng);
-    expectedResult := dstInd[1]*ZmodnZObj(42,121);
-    Assert(0, coercedPol=expectedResult);
-     
-    CoerceScalar@FR( scalar,dstRng ); #ok.
-
-   # baseField := Integers;
-   # dstRng := PolynomialRing(baseField ,1);
-   # CoercePolynomial@FR(pol, dstRng);  # fails and probably should fail, but how to use in a test?
-end
-);
-
-
-# coerce polynomial or scalar elements in vec to elements in dstRing.
-# works only for prime fields...
-InstallGlobalFunction( CoerceTensor@FR ,
-function( tensor,  dstRing )
-    local coercedTensor,polRepCopy, coercedPol, coordinate, pos, polRep, fam, intVal;
- 
-    if not IsList(tensor) then
-        return  CoerceTensor@FR( [tensor], dstRing)[1];
-    fi;
-    coercedTensor := List( [1..Size(tensor)], n->0 ) ;
-        for coordinate in  [1..Size( tensor)] do 
-            if IsList( tensor[coordinate] ) then
-                 coercedTensor[coordinate] := CoerceTensor@FR( tensor[coordinate], dstRing );
-            else
-                if IsPolynomial( tensor[coordinate] ) then
-                    coercedTensor[coordinate] :=  CoercePolynomial@FR( tensor[coordinate], dstRing) ;
-                else
-                    coercedTensor[coordinate] :=  CoerceScalar@FR( tensor[coordinate] , dstRing) ;
-                fi;
-            fi;
-        od;
-    return coercedTensor;
-end
-);
-
-
-
-
-
-#################################### EVALUATE POLYNOMIALS ################################################################
-
-
-
-# EvalPolynomialTensor: substitute all indeterminates in the tensor by corresponding values.
-# parameters:  ( tensor, indeterminates , values )
-# precondition: tensor elements are polynomials over indeterminates and indeterminates belong to the same ring.
-# postconditon:  indeterminates[i] is replaced by values[i];
-# note: why was/ is the multiplication with One(values[1]) necessary?  
-#        => assume we want to evaluate an polynomial 1/3*x^0 where x is ZmodnZObj( 1, 121 ). 
-#       The result will be 1/3 while  1/3* ZmodnZObj( 1, 121 ) will give ZmodnZObj( 81, 121 ).
-# end note
-# todo: check if all values belongs to the same Ring.
-#
-InstallGlobalFunction( EvalPolynomialTensor@FR ,
- function( tensor, indeterminates , values )
-    local pos,  evaluatedTensor;
-
-    if not  Size(indeterminates) = Size(values) then 
-    	Error("EvalPolynomialTensor: number of indeterminates and values must be the same");
-    fi;
-    
-    for pos in [1..Size(values)] do 
-    	if not One( values[1] )=One(values[pos]) then
-    		Error("EvalPolynomialTensor: values must belong to the same ring ");
-    	fi;
-    od;
-     
-
-    if not IsList(tensor) then
-        return  EvalPolynomialTensor@FR( [tensor], indeterminates , values )[1];
-    fi;
-
-     evaluatedTensor :=  List( [1..Size(tensor)], n->0);
-    for pos in [1..Size(tensor)] do 
-          if IsList( tensor[pos] ) then
-              evaluatedTensor[pos]:= EvalPolynomialTensor@FR (tensor[pos], indeterminates, values);
-          else
-              evaluatedTensor[pos]:= One(values[1])* Value( tensor[pos], indeterminates, values );
-               # evaluatedTensor[pos]:=Value( tensor[pos], indeterminates, values );
-          fi;
-    od;
-  
-    return evaluatedTensor;
-end
-);
-
-
-# for some reason  EvalPolynomialTensor with implicit coertion (multiplication with One) was bad, and therefore I wrote EvalPolynomialTensorWeak
-# but I forgot the caused problem
-#
-#InstallGlobalFunction( EvalPolynomialTensorWeak ,
-# function( tensor, indeterminates , values )
-#    local pos,  evaluatedTensor;
-#
-#    if not  Size(indeterminates) = Size(values) then 
-#    	Error("EvalPolynomialTensorWeak: number of indeterminates and values must be the same");
-#    fi;
-#    
-#    for pos in [1..Size(values)] do 
-#    	if not One( values[1] )=values[pos] then
-#    		Error("EvalPolynomialTensorWeak: values must belong to the same ring ");
-#    	fi;
-#    od;
-#
-#    if not IsList(tensor) then
-#        return  EvalPolynomialTensorWeak( [tensor], indeterminates , values )[1];
-#    fi;
-#
-#     evaluatedTensor :=  List( [1..Size(tensor)], n->0);
-#    for pos in [1..Size(tensor)] do 
-#          if IsList( tensor[pos] ) then
-#              evaluatedTensor[pos] := EvalPolynomialTensorWeak (tensor[pos], indeterminates, values);
-#          else
-#               evaluatedTensor[pos] := Value( tensor[pos], indeterminates, values );
-#          fi;
-#    od;
-#  
-#    return evaluatedTensor;
-#end
-#);
-
-
-#InstallGlobalFunction( TEST_EVAL_POLYNOMIAL_TENSOR@FR ,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_EVAL_POLYNOMIAL_TENSOR", 
- function()
-    local rng, ind, x,y,mat,dstRng, evaluatedTensor, weakEvaluatedTensor;
-    rng := PolynomialRing(Rationals,2);
-    ind := IndeterminatesOfPolynomialRing(rng);
-    x:=ind[1];
-    y:=ind[2];
-    mat:=[[1/3*x^0, x^0,x+y]];
-    dstRng := ZmodnZ(121);
-    
-    evaluatedTensor := EvalPolynomialTensor@FR(mat, [x,y],[ZmodnZObj( 1, 121 ),ZmodnZObj( 2, 121 )]);
-
-    #weakEvaluatedTensor := EvalPolynomialTensorWeak@FR(mat, [x,y],[ZmodnZObj( 1, 121 ),ZmodnZObj( 2, 121 )]);
-    #CoerceTensor@FR( weakEvaluatedTensor, dstRng); # liefert_e_ nicht das was man erwartet 
- 
-    EvalPolynomialTensor@FR(mat, [x,y],[ZmodnZObj( 1, 121 ),ZmodnZObj( 2, 121 )]);
-end
-);
-
-
-InstallGlobalFunction( SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR,
- function( vec, ind , solution, dstFam  )
-    local pos,  evaluatedVec, fam, polRep,coeffPos, polRepCopy,  coeffVal , coercedPol ;
-
-    if not  Size(ind) = Size(solution) then 
-    	Error("SubstitutePolynomialCoefficients: number of indeterminates and values must be the same");
-    fi;
-    
-    for pos in [1..Size(solution)] do 
-    	if not One( solution[1] )=One(solution[pos]) then
-    		Error("SubstitutePolynomialCoefficients: because of impicit coercion solution elements expected belong to the same ring ");
-    	fi;
-    od;
-    
-    if not IsList(vec) then
-        return  SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR( [vec], ind , solution, dstFam )[1];
-    fi;
-
-   
-    evaluatedVec :=  List( [1..Size(vec)], n->0);
-    for pos in [1..Size(vec)] do 
-          if IsList( vec[pos] ) then
-              evaluatedVec[pos] := SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR (vec[pos], ind, solution,dstFam);
-          else
-            polRep := ExtRepPolynomialRatFun(  vec[pos] );
-            polRepCopy := ShallowCopy(polRep);
-            for coeffPos in [1..Size(polRep)/2] do
-                coeffVal := Value( polRep[2*coeffPos],ind,  solution );
-                polRepCopy[2*coeffPos] := coeffVal*One( solution[1] );
-            od;      
-            coercedPol :=  PolynomialByExtRep(dstFam, polRepCopy);
-            evaluatedVec[pos] := coercedPol;
-          fi;
-    od;
-    return evaluatedVec;
-end
-);
-
-
-#InstallGlobalFunction( TEST_SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_SUBSTITUTE_POLYNOMIAL_COEFFICIENTS", 
-function()
-    local rng, ind, a, b, iterRng,iterInd, x, y, pol, dstRng, dstFam, result,
-    PREV_ITER_POLY_WARN;
-    
-    rng := PolynomialRing(Rationals,3);
-    ind := IndeterminatesOfPolynomialRing(rng);
-    a := ind[1];
-    b := ind[2];
-    PREV_ITER_POLY_WARN := ITER_POLY_WARN;
-    ITER_POLY_WARN := false;
-    iterRng := PolynomialRing(rng,2);
-    ITER_POLY_WARN := PREV_ITER_POLY_WARN;
-    
-    iterInd := IndeterminatesOfPolynomialRing(iterRng);
-    x := iterInd[1];
-    y := iterInd[2];
-    
-    pol := a*b*x+b*y;
-    dstRng := PolynomialRing( Rationals,2 );
-    dstFam := FamilyObj( One(dstRng) );
-    result := SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR( pol , ind , [2,1,0], dstFam  );
-    Assert(0,  CoercePolynomial@FR(result,iterRng) = CoercePolynomial@FR(2*x+y, iterRng ) );
-    
-    #Assert(0,  result = CoercePolynomial@FR(2*x+y, dstRng ) );  
-    
-end
-);
-
-#################################### POLYNOMIAL PROPERTIES ################################################################
-
-InstallMethod( CountPolynomialVariables@FR ,
-"count variables appeared in a polynomial. Zero monomials are ignored. " , [IsPolynomial],
-function(polynomial)
-    local coeffData, variableIdx, pos, variableIndices, indIdx;
-
-    if not IsPolynomial(polynomial) then
-        Error("parameter is not a polynomial!");
-    fi;
-    
-    variableIndices := [];
-    coeffData := ExtRepPolynomialRatFun(polynomial);
-    for pos in [1..Size(coeffData)/2] do
-        for indIdx in [1..Size( coeffData[2*pos-1])/2] do
-              Append( variableIndices, [ coeffData[2*pos-1][2*indIdx-1] ] );
-        od;
-    od;
-  
-    return Size( Set(variableIndices) );
-end
-);
-
-
-#InstallGlobalFunction( TEST_COUNT_POLYNOMIAL_VARIABLES@FR ,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_COUNT_POLYNOMIAL_VARIABLES", 
-function()
-    local rng, indeterminates,x,y;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x","y"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-
-    Assert(0, CountPolynomialVariables@FR(y)=1);
-    Assert(0, CountPolynomialVariables@FR(x*y)=2);
-    Assert(0, CountPolynomialVariables@FR(x+y)=2);
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils",], "IsMonic", 
-function(pol)
-    Assert(0, IsUnivariatePolynomial(pol));
-    return IsOne(LeadingCoefficient(pol));
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils",], "TEST_IS_MONIC", 
-function()
-    local rng, indeterminates, x;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    Assert(0, IsMonic@FR@Utils(x));  
-    Assert(0, not IsMonic@FR@Utils(2*x));
-end
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils",], "IsIndeterminate", 
-function(variable)
-    return IsUnivariatePolynomial(variable) and Degree(variable)=1 and IsOne(LeadingCoefficient(variable)) and Size(ExtRepPolynomialRatFun(variable))=2;
-end
-);
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils",], "TEST_IS_INDETERMINATE", 
-function()
-    local rng, indeterminates, x,y;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x","y"] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-    Assert(0, IsIndeterminate@FR@Utils(x));
-    Assert(0, IsIndeterminate@FR@Utils(y));
-    Assert(0, not IsIndeterminate@FR@Utils(y+x));
-    Assert(0, not IsIndeterminate@FR@Utils(1+x));
-    Assert(0, not IsIndeterminate@FR@Utils(2*x));
-end
-);
-
-
- InstallGlobalRecordOperation@FR ( ["@FR@Utils"], "HomogenizedPolynomial", 
-  [IsPolynomial, IsObject,IsObject] 
- );
- 
-
-InstallGlobalRecordMethod@FR ( ["@FR@Utils"], "HomogenizedPolynomial","homogenize polynomial", [IsPolynomial, IsObject, IsObject],
-function(pol, homogenVariable, degree)
-
-    local coeffData, coeffs, monomials,newPol;
-    if IsZero(pol) then
-        return pol;
-    fi;
-    
-    Assert(0,IsIndeterminate@FR@Utils(homogenVariable) );
-    Assert(0, degree>= Degree@FR@Utils(pol) );
-    coeffData := CoefficientsEx@FR(pol);
-    coeffs := coeffData[1];
-    monomials := coeffData[2];
-    monomials:= List(monomials, monomial-> monomial*homogenVariable^(degree- Degree@FR@Utils(monomial)) );
-    newPol:= coeffs*monomials;
-    return newPol;
-end
-);
-
-
-InstallGlobalRecordOtherMethod@FR ( ["@FR@Utils"], "HomogenizedPolynomial","homogenize polynomial", [IsPolynomial, IsObject],
-function(pol, homogenVariable)
-
-     return @FR@Utils.HomogenizedPolynomial(pol, homogenVariable,  Degree@FR@Utils(pol) );
-end
-);
-
-
- ReInstallGlobalRecordOperation@FR ( ["@FR@Utils"], "IndeterminatesOfPolynomial", 
-  [IsPolynomial] 
- );
- 
-# todo: had a bug. Missing test...
-InstallGlobalRecordMethod@FR ( ["@FR@Utils"], "IndeterminatesOfPolynomial","get polynomial indeterminates", [IsPolynomial],
-function(polynomial)
-    local result, coeffData, monomialData, monomialIdx, indeterminateIdPos, variableIds, variableList, one;
-    
-    result := [];
-    coeffData := ExtRepPolynomialRatFun(polynomial);
-    
-    variableIds := [];
-    if Size(coeffData)<1 then
-        return [];
-    fi;
-    for monomialIdx in [1..Size(coeffData)/2] do
-    
-        monomialData := coeffData[monomialIdx*2-1];
-        for indeterminateIdPos in [1..Size(monomialData)/2] do
-            Append(variableIds, [ monomialData[indeterminateIdPos*2-1] ]);
-        od;
-    od;
-    variableIds := Set(variableIds);
-    one := One( CoefficientsFamily(FamilyObj(polynomial)));
-   
-    variableList := List(variableIds, id->  PolynomialByExtRep( FamilyObj( polynomial), [ [ id, 1], one ] ) );  
-    
-    return variableList;
-end
-);
-
-
-
- InstallGlobalRecordOperation@FR ( ["@FR@Utils"], "IsHomogenized", 
-  [IsPolynomial] 
- );
- 
-
-InstallGlobalRecordMethod@FR ( ["@FR@Utils"], "IsHomogenized","check if  polynomial is homogenized", [IsPolynomial],
-function(pol)
-
-    local coeffData, coeffs, monomials,monomialDegrees;
-    if IsZero(pol) then
-        return true;
-    fi;
-    
-    coeffData := CoefficientsEx@FR(pol);
-    coeffs := coeffData[1];
-    monomials := coeffData[2];
-    monomialDegrees := List( monomials, monomial-> Degree@FR@Utils(monomial) );
-    monomialDegrees := Set(monomialDegrees);
-    return Size(monomialDegrees)=1;
-end
-);
-
- 
-
- InstallGlobalRecordOperation@FR ( ["@FR@Utils"], "DehomogenizedPolynomial", 
-  [IsPolynomial, IsObject] 
- );
- 
- 
-InstallGlobalRecordMethod@FR ( ["@FR@Utils"], "DehomogenizedPolynomial","dehomogenize polynomial", [IsPolynomial,IsPolynomial],
-function(pol, homogenVariable)
-    if not IsHomogenized@FR@Utils(pol)  then
-        Error("polynomial is not homogenized");
-    fi;
-    
-     if not IsIndeterminate@FR@Utils(homogenVariable) then
-        Error ("parameter homogenVariable is not a variable");
-     fi;
-     if not homogenVariable in IndeterminatesOfPolynomial@FR@Utils(pol) then
-        Error ("parameter homogenVariable is not an inteterminate of the polynomial");
-     fi;
-     return Value( pol, [ homogenVariable ], [ One(homogenVariable)] );
-end
-);
-
-
-InstallGlobalRecordOtherMethod@FR ( ["@FR@Utils"], "DehomogenizedPolynomial","dehomogenize polynomial", [IsPolynomial],
-function(pol)
-
-    local coeffData, coeffs, monomials,newPol,indeterminates;
-
-    if not IsHomogenized@FR@Utils(pol)  then
-        Error("polynomial is not homogenized");
-    fi;
-    if IsZero(pol) then
-        return pol;
-    fi;
-    indeterminates := IndeterminatesOfPolynomial@FR@Utils(pol);
-    if Size(indeterminates)<=1 then
-        return pol;
-    fi;
-    return DehomogenizedPolynomial@FR@Utils( pol, indeterminates[ Size(indeterminates)] );
-end
-);
-
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_DEHOMOGENIZE_POLYNOMIAL", 
-function()
-    local rng, ind, x,y, pol, hpol, dhpol;
-
-	 rng := PolynomialRing(Rationals,["x","y"]);
-	 #rng := PolynomialRing(GF(121),["x","y"]);
-	 ind := IndeterminatesOfPolynomialRing(rng);
-	 x:=ind[1];
-	 y:=ind[2];
-	 
-	 pol := 2*(2*x^2-3)^2*(x-4);
-	 hpol:=HomogenizedPolynomial@FR@Utils(pol,y);
-	 dhpol:=DehomogenizedPolynomial@FR@Utils(hpol,y);
-	 Assert(0, dhpol=pol);
-	 dhpol:=DehomogenizedPolynomial@FR@Utils(hpol);
-	 Assert(0, dhpol=pol);
-end
-);
-
-
-
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_HOMOGENIZE_POLYNOMIAL", 
-function()
-    local rng, ind, x,y, pol, hpol, coeffData, monom, monomials;
-
-	 rng := PolynomialRing(Rationals,["x","y"]);
-	 #rng := PolynomialRing(GF(121),["x","y"]);
-	 ind := IndeterminatesOfPolynomialRing(rng);
-	 x:=ind[1];
-	 y:=ind[2];
-	 
-	 pol := 2*(2*x^2-3)^2*(x-4);
-	 Assert(0, not IsHomogenized@FR@Utils(pol) );
-	 hpol:= @FR@Utils.HomogenizedPolynomial(pol,y,6);
-	 Assert(0,   IsHomogenized@FR@Utils(hpol) );
-	 coeffData := CoefficientsEx@FR(hpol);
-	 monomials := coeffData[2];
-	 for monom in monomials do
-	    Assert(0, Degree@FR@Utils(monom)=6 );
-	 od;	  
-	 
-	 hpol:= @FR@Utils.HomogenizedPolynomial(pol,y);
-     Assert(0,   IsHomogenized@FR@Utils(hpol) );
-	 coeffData := CoefficientsEx@FR(hpol);
-	 monomials := coeffData[2];
-	 for monom in monomials do
-	    Assert(0, Degree@FR@Utils(monom)=5 );
-	 od;	 
-end
-);
-
-
-# check if polynomiyl is constant: use  IsConstantRationalFunction
-
-#################################### POLYNOMIAL FACTORS AND PRODUCTS ################################################################
-
-InstallMethod( IsPower@FR, "check if data structure is a power data structure", [IsList],
-function(power)
-	if Size(power)<>2  then
-		return false;
-	fi;
-	if fail=ApplicableMethod(\^,[power[1],power[2]]) then
-		return false;
-	fi;
-	return true;
-end
-);
-
-
-InstallGlobalFunction( CreatePower@FR,
-function(base,exponent)
-  if IsPower@FR( [base, exponent ] ) then
-  	return [ base, exponent ];
-  fi;
-  Assert(0, false);
-end
- );
-
-# return factors of a polynomial with the property that for each pair of the factors their Gcd is always at most a constant.
-# also the unique factors do not contain scalars (only factors of degree>0!)
- InstallMethod( DistinctMonicFactors@FR , 
- " # return distinct monic factors (no constants) of an univariate polynomial. ", [ IsPolynomial ],
- function(polynomial)
- 	local factors, factor1, factor2 ;
- 	if not IsUnivariatePolynomial(polynomial) and not (IsHomogenized@FR@Utils(polynomial) and IndeterminateNumber@FR(polynomial)=2 ) then
- 		Error("DistinctMonicFactors@FR: parameter is not an univatiate or homogenized polynomial");
- 	fi;
- 	factors :=  ShallowCopy (Factors( polynomial) );
-     	factors[1] := StandardAssociate( factors[1] );
-  
-  	if (  Degree@FR@Utils(factors[1]) ) =0 then 
-  		Remove(factors,1);
-  	fi;
-	factors:= Set ( factors );
-	
-	return factors;
-end 
-);
-
-
-#InstallGlobalFunction( TEST_DISTINCT_MONIC_FACTORS@FR,
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_DISTINCT_MONIC_FACTORS", 
-function()
-    local rng, indeterminates, x, pol, result;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x" ] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    pol := 4*(x-3)^10*(3*x-2)^3;
-    result := DistinctMonicFactors@FR(pol);
-    Assert(0, result = [(x-3),(x-8) ]);
-    pol := 4*x^0;
-    result := DistinctMonicFactors@FR(pol);
-    Assert(0, Size(result) = 0 );
-end
-);
-
-
-# computes the value of a product (a product is a list of powers. A power is a pair [ base, exponent ] ).
-InstallGlobalFunction( PRODUCT_VALUE@FR ,
-function( product ) 
-    local value, power;
-   
-    value := 1 ;
-    for power in product do
-        value := value* power[1]^power[2];
-    od;
-    return value;
-end );
-
-
- 
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_PRODUCT_VALUE", 
-function()
-
-    local rng, indeterminates, x, product;
-    
-    rng := PolynomialRing( ZmodnZ(11)  ,["x" ] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    
-    product := [[2,3]];
-    Assert(0, 2^3= PRODUCT_VALUE@FR( product));
-    
-    product := [ [x-3,3] ];
-    Assert(0, (x-3)^3 = PRODUCT_VALUE@FR( product));
-    
-    product := [ [x-3,3], [x,2] ] ;
-    Assert(0, (x-3)^3*x^2 = PRODUCT_VALUE@FR( product));
-    
-     product := [  ] ;
-    Assert(0, 1 = PRODUCT_VALUE@FR( product));
-end
-);
-
-
-InstallMethod( UNIQUE_PRODUCT_HOMOGENIZED@FR,
-"factors an univariate polynomial over rationals or finite fields into  power factors ", [ IsPolynomial ],
-function( polynomial )
-    local localPolynomial, degree, factors, unit , uniqueFactors, uniqueProduct, uniqueProductPart, n, l,ind;
-    
-    if  not IsHomogenized@FR@Utils(polynomial) or IndeterminateNumber@FR(polynomial)<>2 then
- 		Error("UNIQUE_PRODUCT_HOMOGENIZED: first parameter is not a  homogenized polynomial");
-    fi;
-    degree:=Degree@FR@Utils(polynomial);
-    ind := IndeterminatesOfPolynomial@FR@Utils(polynomial);
-    Assert(0, Size(ind)=2 );
-    localPolynomial := DehomogenizedPolynomial@FR@Utils(polynomial,ind[2]);
-    
-    factors := ShallowCopy(Factors(localPolynomial));
-    unit    := factors[1]/StandardAssociate( factors[1] );
-    factors[1] := StandardAssociate( factors[1] );
-
-    uniqueFactors := Set(factors);
-        
-    uniqueProduct := [  ];
-    if not IsOne(unit) then
-        Append( uniqueProduct, [[unit,1] ] );
-    fi;
-    uniqueProductPart := List( [1..Size(uniqueFactors)], 
-                               n->[ HomogenizedPolynomial@FR@Utils(uniqueFactors[n],ind[2]), Number( factors , function(l) return l=uniqueFactors[n]; end ) ] );
-    if Degree@FR@Utils(localPolynomial)< Degree@FR@Utils(polynomial) then
-        Append(uniqueProductPart, [ [ ind[2],  Degree@FR@Utils(polynomial)-Degree@FR@Utils(localPolynomial)] ] );
-    fi;
-                                   
-    Append( uniqueProduct,  uniqueProductPart  );
-
-    return uniqueProduct;
-    
-end
-);
-
-
-
-# UNIQUE_PRODUCT: factors an univariate polynomial over rationals or finite fields into  power factors 
-# ( a power is a pair of [base,exponent] ) with distinct bases
-# see also 'Factors'
-InstallMethod( UNIQUE_PRODUCT@FR,
-"factors an univariate polynomial over rationals or finite fields into  power factors ", [ IsPolynomial ],
-function( polynomial )
-    local factors, unit , uniqueFactors, uniqueProduct, uniqueProductPart, n, l;
-    
-    if not IsUnivariatePolynomial(polynomial) and 
-       not (IsHomogenized@FR@Utils(polynomial) and IndeterminateNumber@FR(polynomial)=2  ) then
- 		Error("UNIQUE_PRODUCT: first parameter is not a univariate or homogenized polynomial");
-    fi;
-    if IsHomogenized@FR@Utils(polynomial) and IndeterminateNumber@FR(polynomial)=2 then
-        return UNIQUE_PRODUCT_HOMOGENIZED@FR(polynomial);
-    fi;
-    factors := ShallowCopy(Factors(polynomial));
-    unit    := factors[1]/StandardAssociate( factors[1] );
-    factors[1] := StandardAssociate( factors[1] );
-
-    uniqueFactors := Set(factors);
-        
-    uniqueProduct := [  ];
-    if not IsOne(unit) then
-        Append( uniqueProduct, [[unit,1] ] );
-    fi;
-    uniqueProductPart := List( [1..Size(uniqueFactors)], 
-                               n->[ uniqueFactors[n], Number( factors , function(l) return l=uniqueFactors[n]; end ) ] );
-    Append( uniqueProduct,  uniqueProductPart  );
-    return uniqueProduct;
-    
-end
-);
-    
-
-# just an alternative implamentation for UNIQUE_PRODUCT@FR
-InstallMethod( UNIQUE_PRODUCT_1@FR, 
-"factors an univariate polynomial over rationals or finite fields into  power factors ", [ IsPolynomial ],
-function( polynomial )
-   local uniqueProduct, factors, factor, multiplicity, tmp, scalarFactor , value ;
-   if not IsUnivariatePolynomial(polynomial) and not IsHomogenized@FR@Utils(polynomial) then
- 		Error("UNIQUE_PRODUCT_1: first parameter is not a univariate or homogenized polynomial");
-   fi;
- 	
-    uniqueProduct := [];
-    factors := DistinctMonicFactors@FR( polynomial) ;
-    Degree@FR@Utils(polynomial);
-    for factor in factors do
-        tmp:=polynomial;
-        multiplicity := 0;
-        tmp:=tmp/factor;
-        while  Degree@FR@Utils( DenominatorOfRationalFunction(tmp) )<=0 do
-            tmp := tmp/factor;
-            multiplicity:=multiplicity+1;
-        od;
-        Append( uniqueProduct, [ [factor, multiplicity] ] );
-    od;
-
-    value := PRODUCT_VALUE@FR(uniqueProduct);
-    scalarFactor := polynomial/value;
-    if not IsOne(scalarFactor) then
-        Append( uniqueProduct, [ [scalarFactor, 1] ] );
-    fi;
-
-    return uniqueProduct;
-end 
-);
-
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_UNIQUE_PRODUCT", 
-function()
-    local rng, indeterminates, x, y, expectedProduct, pol, result;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x","y" ] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-    y := indeterminates[2];
-        
-    pol := (x-3)^3 ;
-    
-    result := UNIQUE_PRODUCT@FR(pol);
-    
-    Assert(0, result = [ [ x-3, 3 ] ]);
-    
-    pol := 3*(x-3)^3 ;    
-    result := UNIQUE_PRODUCT@FR(pol);
-    Assert(0, result = [  [ x-3, 3 ],[ One(rng)*3,1]  ] );
-    
-    pol := (x-3)^3*x^2;
-    result := UNIQUE_PRODUCT@FR(pol);
-    expectedProduct := [  [x,2], [x-3,3] ] ;
-    Assert(0, expectedProduct = result );
-    
-    pol := (x-3)^3*x^2;
-    pol:=HomogenizedPolynomial@FR@Utils(pol,y,6);
-    result := UNIQUE_PRODUCT@FR(pol);
-    expectedProduct := [  [x,2], [x-3,3],[y,1] ] ;
-
-     pol := x^0;
-     result := UNIQUE_PRODUCT@FR(pol);
-     expectedProduct := [  ] ;
-        Assert(0, expectedProduct = result );
-
-     pol := 5*x^0;
-     result := UNIQUE_PRODUCT@FR(pol);
-     expectedProduct := [ [One(rng)*5,1 ] ] ;
-    Assert(0, expectedProduct = result );
-    
-end
-);
-
-
-# removes constant factors from a list of polynomial powers.
-# (a polynomial constant factor is a power data [ base, exponent ] where Degree(base)=0 ) ;
-  InstallGlobalFunction( REMOVE_CONSTANT_FACTORS@FR ,
-function( powers )
-    local factor, result;
-    result:= [];
-    for factor in  powers do
-        Assert( 0, Size(factor)=2 );
-        Assert( 0, factor[2] in Integers );
-        if IsPolynomial( factor[1] ) and  Degree@FR@Utils(factor[1])>0 then
-            Append(result, [ factor ]);
-        fi;
-    od;
-    return result;
-end );
-
-
-
-# sort a list of powers ( a power is a pair of [base,exponent] ) by exponent 
-  InstallGlobalFunction(  SORT_POWERS_BY_EXPONENT@FR , 
-  function( factors )
-    local  result, factor,    tmpFactors, currentExponent, currentFactorList;
-    result := []; 
-    tmpFactors := [];
-    for factor in factors do
-        Append(tmpFactors, [ [ factor[2],factor[1] ] ]) ;
-    od;
-    Sort(tmpFactors);
-     
-    currentExponent:=Null@FR;
-    currentFactorList:=[];
-    while Size(tmpFactors)>0 do
-        if currentExponent=Null@FR or tmpFactors[1][1]>currentExponent then
-            if Size(currentFactorList)>0 then
-                Append(result, [ currentFactorList ]);
-            fi;
-            currentExponent:=tmpFactors[1][1];
-            currentFactorList := [];
-        fi;
-        Append(currentFactorList, [ [ tmpFactors[1][2],tmpFactors[1][1] ] ]);
-        Remove(tmpFactors,1);
-    od;
-    if Size(currentFactorList)>0 then
-         Append(result, [ currentFactorList ]);
-    fi;
-    return result;
-end 
-);
-
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_SORT_POWERS_BY_EXPONENT", 
-function()
-    local factors,
-    sortedFactors, expectedResult;
-    factors := [ [ 3,2 ], [ 3,1 ], [ 4,2 ], [ 3,3 ] ];
-    sortedFactors := SORT_POWERS_BY_EXPONENT@FR( factors );
-    
-    expectedResult := [ [ [ 3,1 ]], [ [3,2], [ 4,2 ] ], [ [ 3,3 ] ] ];
-   
-    Assert(0,  expectedResult=sortedFactors );
-    
-    factors := [   ];
-    sortedFactors := SORT_POWERS_BY_EXPONENT@FR( factors );
-    
-    expectedResult := [  ];
-    Assert(0,  expectedResult=sortedFactors );
-end
-);
-
-
-InstallGlobalRecordFunction@FR (["@FR@Utils","Internal"], "RemoveLineByLeadingString",
-function( lines, leadingString, separators, last)
-   local localRow;
-   Assert(0, IsList(lines));
-   Assert(0, IsList(separators));   
-   Assert(0, last=true or last=false);
-   Assert(0, IsString(leadingString) );
-   
-   if Size(lines)=0 then
-        return lines;
-   fi;
-   
-   localRow := SplitString(lines[1],separators);
-   if last then
-    localRow := SplitString(lines[Size(lines)],separators);
-   fi;
-   
-   while not fail=Position(localRow,"") do Remove (localRow, Position(localRow,"")); od;
-   
-  
-   if leadingString in localRow then
-  
-      Assert(0, localRow[1]=leadingString);
-      
-      if last then 
-          lines := List([1..Size(lines)-1], i->lines[i]);
-       else       
-          lines := List([2..Size(lines)], i->lines[i]);
-      fi;
-   fi;
-   return lines;   
-end
-);
-
-# wenn local in der zweiten zeile, dann ... entferne die erste UND zweite Zeile, sonst nur die erste
-
-# UNSTABLE! do not use extensively! Would either require a system function ' Function.body.toString()' 
-#  ( function body without variable declarations ) or a begin and end body marker variable. 
-
-# e.g. 
-#
-# testfkt:=
-# function()
-#   local var1, BEGIN_MARKER, END_MARKER;
-#   BEGIN_MARKER;
-#   var1:=3;
-#   END_MARKER;
-# end;
-
-# String(@FR@Utils.Tests.TEST_SORT_POWERS_BY_EXPONENT);
-InstallGlobalRecordFunction@FR (["@FR@Utils","Internal"], "CreateTestString",
-function( testRecordVariableString, prefix)
-    local testRecord, prefixString, str,strs, fullStr, name,strNew, pos, localRow, separators, line,strsCopy;
-
-    testRecord := EvalString(testRecordVariableString);
-    fullStr:="";
-    str := "\n";
-    
-    separators := [' ',',',';' ];
-            
-   for name in RecNames(testRecord) do
-    
-       
-        fullStr := Concatenation(fullStr, "#\n#\n");
-        
-        fullStr := Concatenation(fullStr, "# ",testRecordVariableString, ".", name, " : \n" );
-        Assert(0, IsFunction(testRecord.(name)) );
-     
-        str := StringPrint(testRecord.(name));
-       
-        strs := SplitString(str,['\n']);
-        
-        strs := @FR@Utils.Internal.RemoveLineByLeadingString(strs, "function", separators, false);
-      
-        localRow := SplitString(strs[1],separators);
-        while not fail=Position(localRow,"") do Remove (localRow, Position(localRow,"")); od;
-        
-               
-        if (localRow[1]="local") then
-         
-            strs := JoinStringsWithSeparator(strs,"\n");
-            strs := List([Position(strs,';')+1..Size(strs)], n->  strs[n] );
-            strs := SplitString(strs,['\n']);
-        fi;
-        
-        #strs:= @FR@Utils.Internal.RemoveLineByLeadingString(strs, "local", separators, false);
-        strs:= @FR@Utils.Internal.RemoveLineByLeadingString(strs, "end", separators, true);
-       
-        
-        strs:= @FR@Utils.Internal.RemoveLineByLeadingString(strs, "return", separators, true);
-                
-        
-
-        str:="";
-        for line in strs do 
-            if Size(line)>0 and line[Size(line)]=';' then 
-                line:=Concatenation(line,";");
-            fi;          
-            if prefix then
-                line:=Concatenation("gap> ",line);
-            fi;
-            line:=Concatenation(line,"\n");
-            str:= Concatenation(str,line);
-        od;
-     
-        fullStr:= Concatenation(fullStr,"#\n" ,str);
-    od;    
-    return fullStr;
-end
-);
-
-
-
- InstallGlobalRecordOperation@FR ( ["@FR@Utils"], "LinearFactors", 
-  [IsPolynomial,IsObject] 
- );
- 
- # get distinct linear factors with given multiplicity
-  InstallGlobalRecordMethod@FR ( ["@FR@Utils"], "LinearFactors", "get linear factors" , 
-  [IsPolynomial, IsObject] ,
-  function(polynomial, multiplicity)
-    
-        local power,   powerList, result;
-        if not multiplicity=Null@FR and  not IsPosInt(multiplicity) then
-            Error("expected second parameter to be multiplicity or Null@FR");
-        fi;
-        
-        result := [];
-        
-         powerList := UNIQUE_PRODUCT@FR(polynomial);
-         for power in powerList do
-             if Degree@FR@Utils(power[1])=1 and 
-                (multiplicity=Null@FR or 
-                power[2] = multiplicity) then
-                     Append( result, [power[1]] );
-             fi;
-         od;
-         return result;
-  end
- );
- 
- 
-  # get distinct linear factors with arbitrary multiplicity
-  InstallGlobalRecordOtherMethod@FR ( ["@FR@Utils"], "LinearFactors", "get linear factors" , 
-  [IsPolynomial] ,
-  function(polynomial)
-       return @FR@Utils.LinearFactors(polynomial, Null@FR);
-  end
- );
- 
-
-InstallGlobalRecordFunction@FR ( ["@FR@Utils","Tests"], "TEST_LINEAR_FACTORS", 
-function()
-    local rng, indeterminates, x, expectedProduct, pol, factors;
-    rng := PolynomialRing( ZmodnZ(11)  ,["x" ] );
-    indeterminates := IndeterminatesOfPolynomialRing(rng);
-    x := indeterminates[1];
-        
-    pol := (x-3)^3*x*(x^2-2) ;
-    
-    factors := @FR@Utils.LinearFactors(pol,3);
-    Assert(0, Size(factors)=1);
-    
-   factors := @FR@Utils.LinearFactors(pol);
-    Assert(0, Size(factors)=2); 
-end
-);
-
-
-
- 
-InstallGlobalRecordFunction@FR (["@FR@Utils"], "CreateTestString",
-function(prefix)
-    return @FR@Utils.Internal.CreateTestString(" @FR@Utils.Tests", prefix);
-end
-);
-
-
-
-#E hurwitzUtils.gi . . . . . . . . . . . . . . . . . . . . . . . . . . . .ends here
diff --git a/sandbox/hurwitz.kroeker/src/CompileFunctions.h b/sandbox/hurwitz.kroeker/src/CompileFunctions.h
deleted file mode 100755
index ad74af6..0000000
--- a/sandbox/hurwitz.kroeker/src/CompileFunctions.h
+++ /dev/null
@@ -1,123 +0,0 @@
-#ifndef COMPILE_FUNCTIONS
-#define COMPILE_FUNCTIONS
-
-#include <stdio.h>
-
-#include <string.h>
-#include <string>
-
-/** \file CompileFunctions.h
-*
-* @brief contains help functions which are evaluated at compile-time
-
-* contains help functions which are evaluated at compile-time<br>
-* Limitation: the computation is recursive and there are some compiler-depending recursion limits, usually 256.
-*
-* @todo Dateiname irreführend -> ändern!
-*/
-
-//--------------------- Compile-Hilfsfunktionen --------------------
-
-// Vorbelegung von Operationstabellen(z.B: Additionstabellen)  für std::endliche Körper:
-// Auch wenn die Template-Berechnungen zur Compilezeit etwas bringen:
-// die Definition eines statischen const array mit BOOST erwies sich als zu schwierig,
-// (wegen der Syntax mussten Praeprozessorwiederholungen eingesetzt werden,
-// diese sind aber meistens auf 256 wiederholungen beschraekt;// siehe TemplateExperiments.h)
-// Daher sollten die const Definitionen fuer die Operationsstabellen mit einem Hilfsprogramm erstellt werden
-
-
-/** @brief  pow2<x>::value computes \f$ \mbox {\large  $ 2^x $ } \f$ during compile time<br>
-    the computation is recursive and there are some compiler-depending recursion limits, usually 256.
-* 
-*  @note the computation is recursive and there are some compiler-depending recursion limits, usually 256.
-* @ingroup helpFunctions
-*
-* @author Jakob Kröker
-* 
-* @todo is dangerous, because enum value is limited!
-*
-*/
-template <int NN>
-struct pow2		
-{
-	enum	{value		= 2*pow2<NN - 1>::value    };
-	enum	{valueMinusOne  = 2*pow2<NN - 1>::value -1};
-};
-
-
-/** @brief  pow2<0>::value  represents \f$ \mbox {\large  $ 2^0=1 $ } \f$ during compile time
-*
-* @ingroup helpFunctions
-*
-* @author Jakob Kröker
-*
-*/
-template <>
-struct pow2<0>	
-{
-
-	enum	{	value=1	};
-};
-
-
-/** @brief needbits<x>::value computes number of required bits to represent unsigned integer <b>x</b> during compile time
-*
-* @ingroup helpFunctions
-*
-* @author Jakob Kröker
-*
-*/
-template <int NUM>
-struct needbits 
-{
-   	enum	{	value 		= needbits<NUM/2>::value +1		};
-	enum	{	valueplusone 	= needbits<NUM/2>::valueplusone +1	};
-   	enum	{	doubledvalue 	= needbits<NUM/2>::doubledvalue +2	};
-   
-};
-
-
-/** @brief needbits<1>::value computes number of required bits to represent integer <b>1</b> during compile time
-*
-* @ingroup helpFunctions
-*
-* @author Jakob Kröker
-**/
-template <>
-struct needbits<1>
-{ 
-	enum	{	value =1	};
-	enum	{	valueplusone = 2	};
-	enum	{	doubledvalue = 2	};
- 	
-};
-
-template <>
-struct needbits<0>
-{ 
-	enum	{	value =1	};
-	enum	{	valueplusone = 2	};
-	enum	{	doubledvalue = 2	};
- 	
-};
-
-/**  @brief nextpow2num<x>::value computes (at compile time) a power of 2 -value 
-          such that  \f$ \mbox { \large $ 2^x < value=2^a $ } \f$ is valid,
-         where x is the minimal number of bits to represent  the unsigned integer CHAR
-* @ingroup helpFunctions
-*
-* @author Jakob Kröker
-*
-*/
-template <int CHAR>
-struct nextpow2num
-{
-	enum {value = pow2<  needbits<CHAR>::value  >::value };
-};
-
-
-
-// ----------Ende Compile-Hilfsfunktionen --------------------
-
-
-#endif
diff --git a/sandbox/hurwitz.kroeker/src/DebugLogger.cpp b/sandbox/hurwitz.kroeker/src/DebugLogger.cpp
deleted file mode 100644
index bde1f65..0000000
--- a/sandbox/hurwitz.kroeker/src/DebugLogger.cpp
+++ /dev/null
@@ -1,7 +0,0 @@
-
-#include "DebugLogger.h"
-
-
-int DebugLogger::level_g=0;
-nullstream DebugLogger::ns_g ;
-
diff --git a/sandbox/hurwitz.kroeker/src/DebugLogger.h b/sandbox/hurwitz.kroeker/src/DebugLogger.h
deleted file mode 100644
index de33f2d..0000000
--- a/sandbox/hurwitz.kroeker/src/DebugLogger.h
+++ /dev/null
@@ -1,44 +0,0 @@
-#pragma once
-
-
-#include <iostream>
-/// @note idea from http://bytes.com/topic/c/answers/127843-null-output-stream
-struct nullstream:
-    std::ostream {
-        struct nullbuf: std::streambuf 
-            {
-                int overflow(int c) { return traits_type::not_eof(c); }
-            } m_sbuf;
-        nullstream() : std::ios(&m_sbuf), std::ostream(&m_sbuf)
-     {}
-};
-
-// todo: man kann moeglicherweise #I bei allen ausgaben davorsetzen, wenn man den StreamOperator spezialisiert wie z.B. nullstream
-class DebugLogger
-{
-public:
-    static int level_g ;
-
-    static nullstream  ns_g;
-
-    static  void log(std::string message)
-    {
-        if (level_g >0)
-            std::cerr << message;
-    
-    }
-
-    static std::ostream & logStream()
-    {
-        if (level_g==0)
-            return ns_g;
-        return std::cerr;
-    }
-
-    static void setLevel(int level)
-    {
-        level_g=level;
-    }
-
-};
-
diff --git a/sandbox/hurwitz.kroeker/src/FactorPolynomialWrapper.h b/sandbox/hurwitz.kroeker/src/FactorPolynomialWrapper.h
deleted file mode 100644
index 882d92d..0000000
--- a/sandbox/hurwitz.kroeker/src/FactorPolynomialWrapper.h
+++ /dev/null
@@ -1,297 +0,0 @@
-#pragma once
-
-#include <algorithm>
-
-#include <iostream>
-
-#include <ostream>
-
-#include <vector>
-
-
-extern "C" {
-#undef __cplusplus
-    # include "nmod_poly.h"
-#define __cplusplus
-}
-
-
-
-namespace RationalMapSearch
-{
-
-    template <typename TPolRingType>
-    class Power
-    {
-
-        public:
-            typedef typename TPolRingType::Element BaseType;
-            
-
-        private:
-            
-
-
-            BaseType base_m;
-            int exponent_m;
-
-        public:
-
-             Power(const typename  TPolRingType::Element &el  ) :base_m(el),exponent_m(1)            
-            {
-            }
-
-            Power(const typename  TPolRingType::Element &el , int exponent) :base_m(el),exponent_m(exponent)            
-            {
-            }
-
-            Power(const Power& pow) :base_m(pow.base_m),exponent_m(pow.exponent_m)            
-            {
-            }
-
-            /*Power& operator = (const Power& pow)
-            {
-                if (&pow==this)
-                    return *this;
-                 BaseType base=pow.base_m;
-                int exponent=pow.exponent_m;
-                base_m=base;
-                exponent_m=exponent;
-                 return *this;
-            }*/
-
-            BaseType getBase() const 
-            {
-                return base_m;
-            }
-
-            BaseType first() const
-            {   return getBase(); }
-
-          
-            int getExponent() const 
-            {
-                return exponent_m;
-            }
-
-            int second() const
-            {   return getExponent(); }
-    };
-
-    template <typename TPower>
-    class Product
-    {
-        public:
-            typedef TPower FactorType;
-
-        private:
-            std::vector< TPower >  factors_m;
-
-        public:
-            //Product() {};
-
-            void push_back(const TPower & pow )
-            {
-                factors_m.push_back(pow);
-            }
-
-            std::vector< TPower > getFactors()  const
-            {
-                return factors_m;
-            }
-        
-            const TPower operator[](size_t pos)   const
-            {   
-                return factors_m.at(pos);
-            }
- 
-            TPower operator[](size_t pos)  
-            {   
-                return factors_m.at(pos);
-            }
-
-            size_t size() const {return factors_m.size(); } 
-        
-    };
-
-   template <typename PolRingType>
-    class CIFactorPolynomial
-    {
-        public:
-           typedef std::vector<typename  PolRingType::Element > (* IFactorPolynomial)(const typename PolRingType::Element & , const PolRingType &  );
-
-            typedef Product<  Power<  PolRingType>  > (* IExtendedFactorPolynomial)(const typename PolRingType::Element & , const PolRingType &  );  
-    };
-
-  
-
-    class FLINTFactorPolynomial
-    {
-
-        public:
-
-            static const bool threadsafe ;
-
-            //typedef typename IrreduciblePolTableType::PolRingType    TPolRing;
-            //typedef typename TPolRing::ElementType  VecElemType;
-           
-            // ok, it seems that factorPolynomial will fail for non-square-free polynomials 
-            // a check is also : multiply all factors and then it should be the original polynomial.
-            template <typename PolRingType>
-            static std::vector<typename  PolRingType::Element > factorPolynomial(const typename  PolRingType::Element & pol, const PolRingType & polRing)  
-            {
- 
-                    typedef typename  PolRingType::ElementType  VecElemType;
-
-                    int degree = pol.getExactDegree();
-
-                      // pol.getCoeffRing()
-                    // check if is Zero  pol(a= for a in 0...char coeffring
-                    const typename PolRingType::CoeffRingType & coeffRing = polRing.getCoeffRing();
-
-                    nmod_poly_t x ;
-                    nmod_poly_init(x ,coeffRing.getCharacteristic() );
-    
-    
-                    // riscy: what if pol.getCoeff is not nonnegative?
-                    for (int currDegree= 0; currDegree<=degree; currDegree++)
-                    {
-                         assert( pol.getCoeff( currDegree).getX()>=0 );
-                         nmod_poly_set_coeff_ui(x,   currDegree,  pol.getCoeff( currDegree).getX() );
-                    }
-                    nmod_poly_factor_t factors;
-                    nmod_poly_factor_init( factors );
-                    nmod_poly_factor ( factors, x );
-                    
-                    std::vector<typename  PolRingType::Element >    factorList;
-                    for (long currFactorPos = 0; currFactorPos< factors[0].num_factors; currFactorPos++)
-                    {   
-                        //std::cerr << " currFactorPos " << currFactorPos << std::endl;
-                        const nmod_poly_struct * currFactor = factors->factors[currFactorPos];
-                        long currDegree = nmod_poly_degree (currFactor);
-                        assert( currDegree>=0 );
-                        typename PolRingType::ElementType    pol=   typename PolRingType::ElementType(currDegree);
-                        for (int currExp=0;currExp<=currDegree;currExp++)
-                        {
-                          //  std::cerr << " currExp " << currExp << std::endl;
-                            
-                            ulong currCoeff= nmod_poly_get_coeff_ui(currFactor,currExp);
-
-                            //std::cerr << " currCoeff " << currCoeff << std::endl;
-                            pol.setCoeff(currExp, polRing.getCoeffRing().Convert(currCoeff));
-                        }
-                        factorList.push_back(pol);
-                    }
-
-                    nmod_poly_clear (x);
-                    nmod_poly_factor_clear (factors);
-
-                    return factorList ;
-           };
-
-            template <typename PolRingType>
-            static std::vector<int > computeShape(const typename  PolRingType::Element & pol, const PolRingType & polRing) 
-            {
-
-                std::vector<int > shape;
-                
-                 std::vector<typename  PolRingType::Element > elements = factorPolynomial(pol,polRing);
-
-                for (size_t pos=0;pos<elements.size(); pos++)
-                {
-                    int exponent=0;
-                    std::pair<typename  PolRingType::Element,typename  PolRingType::Element> divisionResult;
-                    divisionResult.first = pol;
-                    do 
-                    
-                    {    
-                         divisionResult = polRing.divide( divisionResult.first, elements[pos] );
-                        if (not divisionResult.second.isZero() )
-                            break;
-                        exponent++;
-                        
-                    }
-                    while ( divisionResult.second.isZero() );
-                    assert( exponent>0 );
-                    for (int deg=1; deg<=elements[pos].getExactDegree(); deg++)
-                         shape.push_back( exponent );
-                    
-                }
-
-                 return shape;
-                    
-            }
-
-            template <typename PolRingType>
-            static Product<  Power< PolRingType > >  extendedFactorPolynomial(const typename  PolRingType::Element & pol, const PolRingType & polRing) 
-            {
-                 Product<  Power< PolRingType >  >        prod;
-                
-                 std::vector<typename  PolRingType::Element > elements = factorPolynomial(pol,polRing);
-
-                for (size_t pos=0;pos<elements.size(); pos++)
-                {
-                    int exponent=0;
-                    std::pair<typename  PolRingType::Element,typename  PolRingType::Element> divisionResult;
-                    divisionResult.first = pol;
-                    do 
-                    
-                    {    
-                         divisionResult = polRing.divide( divisionResult.first, elements[pos] );
-                        if (not divisionResult.second.isZero() )
-                            break;
-                        exponent++;
-                        
-                    }
-                    while ( divisionResult.second.isZero() );
-                    assert( exponent>0 );
-                
-                    prod.push_back( Power< PolRingType >( elements[pos],exponent) );
-                    
-                }
-                 return prod;
-            }
-
-          
-
-
-
-            static void test()
-            {
-                std::cerr << " test factor polynomial with FLINT) " << std::endl;
-                typedef TPolRingType::CoeffRingType CoeffRingType;
-        
-                int characteristic = 7;
-                int epsPrecision = 0;
-
-                CoeffRingType *    coeffRing  = new CoeffRingType(characteristic, epsPrecision );
-                    TPolRingType     polRing (*coeffRing);
-
-               TPolRingType::ElementType   pol(4);
-                pol.setCoeff(0,1);
-                pol.setCoeff(2,5);
-                pol.setCoeff(4,1);
-                std::cerr << "pol: " << pol << std::endl;
-                std::vector< TPolRingType::ElementType> factors = FLINTFactorPolynomial::factorPolynomial( pol, polRing );
-
-                std::vector< TPolRingType::ElementType>::iterator it;
-        
-                std::cerr << " factors " << std::endl;
-                for (  it=factors.begin(); it!=factors.end(); it++)
-                {
-                    cout << *(it) << ",  " ; 
-                }
-                
-                std::cerr  << std::endl;
-                //  std::for_each( factors.begin(), factors.end(), []( TPolRingType::ElementType  n) { cout << n << " "; } );
-
-                Shape shape = computeShape(pol,polRing);
-                std::cerr << "shape " << shape;
-                
-            }
-
-    };
-
-   
-}
-
diff --git a/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.cpp b/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.cpp
deleted file mode 100644
index e39c147..0000000
--- a/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.cpp
+++ /dev/null
@@ -1,11 +0,0 @@
-
-#include "HurwitzMapFinder.h"
-
-namespace RationalMapSearch 
-{
-
-   
-
-}
-
-
diff --git a/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.h b/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.h
deleted file mode 100644
index 354563e..0000000
--- a/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.h
+++ /dev/null
@@ -1,797 +0,0 @@
-
-#pragma once
-
-
-#include "Shape.h"
-#include "NormalizationRules.h"
-
-#include "hmfTypedefs.h"
-#include "combinatorics/partition.h"
-#include "IrreduciblePolTable.h"
-#include <map>
-#include <ext/hash_map>
-#include <list>
-#include "combinatorics/combinations.h"
-
-#include "PolSetOutputHandlers.h"
-
-
-
-#include "FactorPolynomialWrapper.h"
-
-
-// todo: wenn degree polSet[2]<12, dann polynom zusammen mit der Multiplizitätsstruktur ausgeben.
-
-
-namespace RationalMapSearch
-{
-
-    
-
-    class HMSProblem
-    {
-
-        public:
-            typedef std::vector<int> PolynomRepType;
-
-
-    private:
-          ShapeList               shapeList_m;
-          NormalizationRuleList   normRuleList_m;
-          bool strictNormalization_m;
-        
-          std::vector<PolynomRepType>     minimalPolynomials_m;
-        
-    public:
-
-        HMSProblem( const ShapeList & sl ,
-                        std::vector<PolynomRepType> minimalPolynomials =  std::vector<PolynomRepType>() ) : shapeList_m(sl),
-                                                                                normRuleList_m( NormalizationRuleList::constructDefault(shapeList_m) ),
-                                                                                minimalPolynomials_m(minimalPolynomials)
-        {
-            checkConsistency();
-        };
-
-        HMSProblem( const ShapeList &sl, const NormalizationRuleList& nrl,
-                            std::vector<PolynomRepType> minimalPolynomials =  std::vector<PolynomRepType>() ): shapeList_m(sl), 
-                                                                                    normRuleList_m(nrl) ,
-                                                                                     minimalPolynomials_m(minimalPolynomials)
-        {
-            checkConsistency();
-        };
-
-      
-
-        void checkConsistency() const
-        {
-            assert( minimalPolynomials_m.size()==0 || minimalPolynomials_m.size()== shapeList_m.size()-3 );
-        }
-        
-        const ShapeList&  getConstShapeListRef() const {  return shapeList_m; };
-
-        ShapeList  getShapeList() const         {  return shapeList_m; };
-
-        size_t      getShapeListSize() const         {  return shapeList_m.size(); };
-
-        const ShapeList&   getShapeListConstRef() const         {  return shapeList_m; };
-
-        NormalizationRuleList  getNormalizationRuleList() const {  return normRuleList_m; };
-
-        NormalizationRuleList  getNormalizationRules() const {  return normRuleList_m; };
-
-        int     getPolSetSize() const   {   return shapeList_m.size();  };
-
-        bool    strictNormalization()     const     {  return normRuleList_m.strictNormalization();   };
-
-        int getMapDegree() const
-        {
-            return shapeList_m.getDegree() ;
-        }
-        int getLowerCharacBound()   const
-            {
-                return shapeList_m.computeLowerCharacBound();
-            }
-
-        const std::vector<PolynomRepType> &    getMinimalPolynomials() const {  return minimalPolynomials_m;    };
-
-    };
-
-   
-
-    class SearchOptions
-    {
-
-      private:
-            bool dryRun_m;
-            bool logStructure_m;
-    
-            bool strictNormalization_m;
-
-            OutputMode  outputMode_m;
-
-            bool bAllNormalizations_m;
-
-        public:
-            SearchOptions():    dryRun_m(false),
-                                logStructure_m(false),
-                                outputMode_m( OutputMode::defaultOutput ), //   requires c++0x
-                                bAllNormalizations_m(false)
-            {};
-
-             SearchOptions(bool dryRun, 
-                            bool logStructure, 
-                            bool strictNormalization,
-                            OutputMode outputMode=OutputMode::defaultOutput ): //requires c++0x
-                                            dryRun_m(dryRun),
-                                            logStructure_m(logStructure),
-                                            strictNormalization_m(strictNormalization),
-                                            outputMode_m(outputMode),
-                                            bAllNormalizations_m(false)
-            {};
-
-      
-            inline OutputMode outputMode()  const {   return outputMode_m;    }
-            inline bool logStructure() const {   return logStructure_m;  }
-            inline  bool dryRun()       const {   return dryRun_m;  }
-    
-            inline  bool strictNormalization()       const {   return strictNormalization_m;  }
-
-            inline  bool allNormalizations()       const {   return bAllNormalizations_m;  }
-    
-            void    print(std::ostream & os) const
-            {
-                os << "SearchOptions( dryRun: " <<  dryRun() << ", logStructure " << logStructure() << ")"<< std::endl;
-            }
-        
-    };
-
-    template <class TPolRingTypePar>
-    class PolynomialSet
-    {
-        public:
-            typedef TPolRingTypePar PolynomialRingType;
-
-            typedef typename TPolRingTypePar::ElementType   PolynomialType;
-
-            typedef typename TPolRingTypePar::ElementType   ElementType;
-    
-            typedef  std::vector< PolynomialType >     PolSetType;
-        
-            
-
-        private:
-            HMSProblem      hmsProblem_m;
-            SearchOptions   searchOptions_m;
-
-            PolSetType  polSet_m;
-        
-            const PolynomialRingType & polynomialRing_m;
-            
-        public:
-            PolynomialSet  ( HMSProblem hms, 
-                            SearchOptions so, 
-                            const PolynomialRingType & polRing,
-                            PolSetType  & polSet  ): hmsProblem_m(hms),    
-                                                     searchOptions_m(so),
-                                                    polynomialRing_m(polRing),
-                                                    polSet_m(polSet)
-            {}
-
-        typename TPolRingTypePar::ElementType operator[](size_t pos)
-        {
-            if ( pos<polSet_m.size() )
-                return polSet_m[pos];
-            assert(false);
-        }
-
-        const typename TPolRingTypePar::ElementType &  operator[](size_t pos) const
-        {
-            if ( pos<polSet_m.size() )
-                return polSet_m[pos];
-            assert(false);
-        }
-        
-        int getDegree() const 
-        {
-            return (hmsProblem_m.getShapeList().getDegree() );
-        }
-
-        const PolynomialRingType & getRing()    const
-        {
-            return polynomialRing_m;
-        }
-
-        inline size_t size()   const
-        {       
-            return polSet_m.size();
-        }
-        
-    };
-
-    // todo: beim normalisieren wird nicht der höchste Exponent ausgewählt...
-    
-    // note : idea to test the FiniteFieldSearch: templatize with level-1, level2- and last-stage-functions!
-    // preconditions:  the first or the second Shape-List should contain a degree 1-Factor to apply the infinityNormalization.  
-    // currently applying the infinityNormalization to the first or second polynomial is mandatory for correct work.
-    /// todo: es gibt eine Abhängigkeit zwischen Shape und minCharacteristic->schaue im Macaulay2-code nach, was es war.
-    
-    template <class TPolRingTypePar>
-    class FiniteFieldSearch
-    {
-      public:
-         typedef std::map<std::string, int64_t>                         StructureHashMapType;
-         typedef   std::map< unsigned int , const  TPolRingTypePar* >  PolRingHashTableType;
-
-
-        typedef     IrreduciblePolTable< TPolRingTypePar > IrreduciblePolTableType;
-
-        typedef   std::map< unsigned int ,  IrreduciblePolTableType* >  IrredPolHashTablesType;  
-
-
-        typedef  FLINTFactorPolynomial  FactorizerType;
-
-
-        //typedef    typename PseudoIrreducibleTest< IrreduciblePolTableType >::IrredTesterFktType          IrredTesterFktType;
-        typedef    typename PseudoIrreducibleExpensiveTest< IrreduciblePolTableType >::IrredTesterFktType          IrredTesterFktType;
-
-    
-        typedef std::vector<PolynomialFactorBluePrint > BPVecTYPE;
-
-        typedef    std::map< int, BPVecTYPE  >      DegSortedConstructionRuleTableType;
-
-        typedef std::vector<size_t>    ScalarCombinationType;
-
-   
-        std::vector<typename TPolRingTypePar::ElementType>   minimalPolynomials_m;
-
-        protected:
- 
-            static PolRingHashTableType    polRingHashTable_m;
-    
-            static IrredPolHashTablesType    irredPolHashTable_m;
-    
-            StructureHashMapType        singleStructureHashmap_m;
-            StructureHashMapType        fullStructureHashmap_m;
-
-               template <typename TProduct>
-            bool normalizationRulesMatches(const std::vector<TProduct> & prodVec  ) const;
-
-   template <typename TProduct>
-            bool normalizationRuleMatches(const std::vector<TProduct> & prodVec , const NormalizationRule & nr,  int degree ) const;
-
-
-        public:
-
-            typedef     TPolRingTypePar TPolRingType;
-            typedef     typename TPolRingTypePar::CoeffRingType CoeffRingType;
-    
-            typedef   std::pair<typename TPolRingType::Element , uint>         TPolFactorPowerType;
-
-            // will contain a list and eachirredTable_m list will contain a list of polynomial roots over fp.
-            typedef std::vector< std::vector< TPolFactorPowerType > >     PolSetBlueprintType;
-
-            typedef std::vector<typename TPolRingTypePar::ElementType >     PolSetType;
-
-        private:
- 
-            std::list<PolSetType>   solutionCandidates_m;
-
-           const    HMSProblem &     hurwitzMapSearchProblem_m;
-            const   SearchOptions   searchOptions_m;
-            
-             IOutputHandler< PolynomialSet<TPolRingTypePar> >* outputHandler_m;
-
-            int     characteristic_m;
-
-           const TPolRingType &  polynomialRing_m;
-    
-          const typename TPolRingType::RingType & field_m;
-
-            typedef int64_t CounterType;
-            mpz_t   counter_m;        ///todo: use mpz integers.        
-            mpz_t   counterMod_m;        ///todo: use mpz integers.      
-
-
-           typename TPolRingTypePar::ElementType    getScalarFromInt(int val)   const;
-        
-            std::list< PolynomialFactorBluePrint>     createPolFactorBlueprintList(  );
-
-            static const TPolRingType & getPolRingRef(uint cardinality)
-            {
-                  if ( polRingHashTable_m.find(cardinality ) == polRingHashTable_m.end() )
-                  {
-                        const typename TPolRingType::RingType* field = new  typename TPolRingType::RingType(cardinality,0);
-                        const   TPolRingType * ring = new TPolRingType(*field);
-                        FiniteFieldSearch::polRingHashTable_m[cardinality] = ring;
-                  }
-                  return *(polRingHashTable_m[cardinality]);
-            }
-            static const TPolRingType & getPolRingRef(uint cardinality, uint generator)
-            {
-                  if ( polRingHashTable_m.find(cardinality ) == polRingHashTable_m.end() )
-                  {
-                        const typename TPolRingType::RingType* field = new  typename TPolRingType::RingType(cardinality,0,generator);
-                        const   TPolRingType * ring = new TPolRingType(*field);
-                        FiniteFieldSearch::polRingHashTable_m[cardinality] = ring;
-                  }
-                  assert( polRingHashTable_m[cardinality]->getGenerator()==generator);
-                  return *(polRingHashTable_m[cardinality]);
-            }
-
-            static const void  setPolRingRef(const TPolRingType * polRing)
-            {
-
-                 polRingHashTable_m[polRing->getCoeffRing().getCardinality() ] =  polRing;
-                 return;
-            }
-
-
-           typename FiniteFieldSearch::IrreduciblePolTableType * getIrredPolTablePtr(uint cardinality)
-            {
-                  if ( irredPolHashTable_m.find(cardinality ) == irredPolHashTable_m.end() )
-                  {
-                         IrreduciblePolTable<TPolRingTypePar>* irredPolTable = new   IrreduciblePolTable<TPolRingTypePar>( getPolRingRef(cardinality)  ,  getIrredTester().first, getIrredTester().second );
-                        FiniteFieldSearch::irredPolHashTable_m[cardinality] = irredPolTable;
-                  }
-                  return ( irredPolHashTable_m[cardinality] );
-            }
-
-            const typename FiniteFieldSearch::IrreduciblePolTableType * getIrredPolTableConstPtr(uint cardinality)
-            {
-                  if ( irredPolHashTable_m.find(cardinality ) == irredPolHashTable_m.end() )
-                  {
-                         IrreduciblePolTable<TPolRingTypePar>* irredPolTable = new   IrreduciblePolTable<TPolRingTypePar>( getPolRingRef(cardinality)  , getIrredTester().first, getIrredTester().second );
-                        FiniteFieldSearch::irredPolHashTable_m[cardinality] = irredPolTable;
-                  }
-                  return ( irredPolHashTable_m[cardinality] );
-            }
-
-            typename FiniteFieldSearch::IrreduciblePolTableType & getIrredPolTableRef(uint cardinality)
-            {
-                  return *(getIrredPolTablePtr(cardinality));
-            }
-
-         
-            
-            /// todo: getIrredTester() kann parametrisiert werden werden!
-            /// returns a pair: irreducibleTest itself and a value if the irreducibleTest is threadsafe.
-            std::pair<typename FiniteFieldSearch::IrredTesterFktType, bool >    getIrredTester()  
-            {
-                
-                //return PseudoIrreducibleExpensiveTest< IrreduciblePolTableType  >::isIrreducible;
-                //return GAPIrreducibleTest< IrreduciblePolTableType  >::isIrreducible;
-                return std::pair<typename FiniteFieldSearch::IrredTesterFktType,bool>(FLINTIrreducibleTest< IrreduciblePolTableType  >::isIrreducible,
-                                                                                        FLINTIrreducibleTest< IrreduciblePolTableType  >::threadsafe)  ;
-
-            }
-
-            typename TPolRingTypePar::ElementType   convertPolRepToRingElem( const typename  HMSProblem::PolynomRepType & polRep) const;
-
-        public:
-
-            void normalizeInPlace( FiniteFieldSearch<TPolRingTypePar>::PolSetType &  polSet)    const;
-
-            void removeConstantFactorsInPlace( FiniteFieldSearch<TPolRingTypePar>::PolSetType &  polSet)    const;
-
-            ///@note formula \$ \frac{1}{degree}\sum_{d|degree}{\nue(degree/d)*q^d}  \$ where q is the cardinality of a finite field, is given by Gauss, see
-            /// "Untersuchungen über höhere Arithmetik", second edition, reprinted, Chelsea publishing company, New York 1981 
-            //CounterType  getIrredCount(int degree)   const;
-            
-            FiniteFieldSearch(const HMSProblem & hms, const SearchOptions& so,  const TPolRingTypePar & );
-
-
-            std::list< PolynomialFactorBluePrint>  createPolFactorConstructionRules(std::vector<int > partition, uint exponent, uint destpolynomial);
-
-            // extract a PolynomialFactorBluePrint to which is is possible to apply the Normalization rule.
-            PolynomialFactorBluePrint* extractMatchingRule(std::list< PolynomialFactorBluePrint> &polFactorConstructRules, NormalizationRule rule);
-
-            
-            bool processNormalizationRules( PolSetBlueprintType & polsetblueprint, 
-                                            std::list< PolynomialFactorBluePrint> &polFactorConstructRules, 
-                                            std::vector<int>  & degreeOneRootList,
-                                            ShapeList & shapeList,
-                                            FiniteFieldSearch<TPolRingTypePar>::PolSetType &  polSet);
-
-            void last_search_level( const ShapeList & shapeList, PolSetType & polSet );
-
-            void renormalize( const ShapeList & shapeList, PolSetType & polSet );
-    
-            void first_third_search_level(DegSortedConstructionRuleTableType & polFactorConstructRules,  
-                                    int maxDegree,
-                                    const std::vector<int> & degreeOneRootList, 
-                                    const ShapeList & shapeList,
-                                    PolSetType & polSet);
-
-            void  third_search_level(const std::vector< std::pair<int, const BPVecTYPE * > > & polFactorConstructRules,  
-                                    const std::vector<int> & degreeOneRootList, 
-                                    const ShapeList & shapeList,
-                                    std::vector< std::pair<int, const BPVecTYPE * > >::const_reverse_iterator    vecIterator,
-                                    PolSetType & polSet,
-                                    mpz_t tmpCounter ,   mpz_t retCounter );
-
-            void second_search_level(std::list< PolynomialFactorBluePrint> polFactorConstructRules);
-
-            void first_search_level( std::list< PolynomialFactorBluePrint>     polfactorBlueprintList,  
-                                      std::list< PolynomialFactorBluePrint>   polFactorConstructRules);
-           
-            void printStructureMap()    const
-            {
-                printStructureMap(fullStructureHashmap_m);  
-            }
-
-            bool computeScalingFactors(const PolSetType &  polSet,   std::vector< typename TPolRingTypePar::CoeffRingType::ElementType > & scalingRel);
-
-            void printStructureMap(StructureHashMapType map)    const
-            {
-
-                size_t exampleBunchCount=0;
-                StructureHashMapType::const_iterator it;
-                for ( it=map.begin(); it!=map.end(); it++)
-                {
-                    exampleBunchCount += (*it).second;
-                    std::cout << (*it).first << "=>" << (*it).second << ", "  << std::endl;
-                    
-                }
-                #ifdef VERBOSE
-                std::cerr << "example count " << exampleBunchCount << std::endl;
-                #endif
-            }
-            void run()   ;
-
-            void  printCount()   const   
-            {                 
-                    #ifdef VERBOSE
-                    //    std::cerr << "# count:= " << counter_m << ";" << std::endl;   
-                    #endif
-                    char*  str= mpz_get_str( NULL, 10, counter_m);
-                
-                    std::string counterStr  (str);
-                    
-                    std::cout << counterStr << ";" << std::endl;   
-                    delete[] str;
-            };
-
-            void  printMpz(mpz_t num)   const   
-            {                 
-                    #ifdef VERBOSE
-                    //    std::cerr << "# count:= " << counter_m << ";" << std::endl;   
-                    #endif
-                    char*  str= mpz_get_str( NULL, 10, num);
-                
-                    std::string counterStr  (str);
-                    
-                    std::cout << counterStr << ";" << std::endl;   
-                    delete[] str;
-            };
-
-            int64_t getCounter()    const   
-            {
-                int64_t result = mpz_get_ui(counter_m);   
-                mpz_t tmp;
-                mpz_init( tmp );
-                mpz_set_ui( tmp,result );
-                
-                if ( mpz_cmp(tmp,counter_m)==0 )
-                    return result;
-                else
-                {
-                    std::cerr << " converting mpz_t failed ... ";
-                    assert(false);
-                }
-            }
-
-            virtual   ~FiniteFieldSearch();
-
-
-    };
-
-    template <typename TPolRingTypePar>
-    typename FiniteFieldSearch<TPolRingTypePar>::PolRingHashTableType   FiniteFieldSearch<TPolRingTypePar>::polRingHashTable_m ;
-
-    template <typename TPolRingTypePar>
-    typename FiniteFieldSearch<TPolRingTypePar>::IrredPolHashTablesType     FiniteFieldSearch<TPolRingTypePar>::irredPolHashTable_m ;
-
- 
-    /// todo: idea: - first compute all possible factorDegree combinations, then sort them by max factorDegree and  
-    /// then start checking with the smallest factorDegree ; also compute irreducible polynomial lists just before they are required
-    /// 
-    class HurwitzMapFinder
-    {
-
-       
-    
-        public:
-            HurwitzMapFinder() {} ;
-            
-            template <class TPolRingTypePar>
-            void finiteFieldSearch(const HMSProblem & hurwitzMapSearchProblem, const SearchOptions& searchOptions, const TPolRingTypePar & polRing)
-            {
-                assert( hurwitzMapSearchProblem.getLowerCharacBound() <= polRing.getCoeffRing().getCardinality() );
-
-                assert( hurwitzMapSearchProblem.getNormalizationRuleList().getNormalizationRuleListAsVector().size()>0 );
-
-                FiniteFieldSearch< TPolRingTypePar > ffs(hurwitzMapSearchProblem, searchOptions, polRing);
-                assert( hurwitzMapSearchProblem.getNormalizationRuleList().getNormalizationRuleListAsVector().size()>0 );
-                ffs.run();
-                
-                if (searchOptions.logStructure() )
-                  ffs.printStructureMap();
-
-                if (searchOptions.dryRun() )
-                    ffs.printCount();
-            }
-
-            static void test()
-            {    
-               // //std::vector< Shape::ScalarType >    partition = { 4,3,2,2,2 };                      
-               // Shape shape = { 4,3,2,2,2 }; //requires initializer lists
-
-                //std::vector< Shape::ScalarType >    partition = { 4,3,2,2,2 };
-
-                int ar[]={ 4,3,2,2,2 };
-                const int TotalItems = sizeof(ar)/sizeof(ar[0]);
-                std::vector< Shape::ScalarType >    partition(ar, ar+TotalItems);
-                Shape    shape(partition);
-                
-                std::vector< Shape >  preShapeList(3,shape);
-                
-                ShapeList   shapeList(preShapeList);
-
-                /* initializing shapelist using initializer lists
-                //ok:
-                 shapeList = std::vector<Shape>{ { 4,3,2,2,2 }, { 4,3,2,2,2 }, { 4,3,2,2,2 } } ;              
-                //ok:
-                 shapeList = ShapeList( { { 4,3,2,2,2 }, { 4,3,2,2,2 }, { 4,3,2,2,2 } } );
-
-               shapeList = ShapeList(  { 4,3,2,2,2 }, { 4,3,2,2,2 }, { 4,3,2,2,2 }  );
-
-                // ok:
-                shapeList  = { { 4,3,2,2,2 }, { 4,3,2,2,2 }, { 4,3,2,2,2 } } ;
-
-                */
-                //ShapeList   shapeList  = { shape, shape, shape } ;
-
-                HMSProblem  hurwitzMapSearchProblem(shapeList);
-
-                assert(hurwitzMapSearchProblem.getNormalizationRuleList().getNormalizationRuleListAsVector().size()>0);
-    
-                bool dryRun,logStructure,strictNormalization;
-
-                const SearchOptions   searchOptions=SearchOptions( dryRun=false, logStructure=true, strictNormalization=false);
-                //const SearchOptions   searchOptions=SearchOptions( dryRun=false, logStructure=false, strictNormalization=false);
-                HurwitzMapFinder    hmf;
-                int characteristic = 7;
-                
-               const   TPolRingType::RingType* field = new    TPolRingType::RingType(characteristic,0);
-                const   TPolRingType * ring = new TPolRingType(*field);
-
-                FiniteFieldSearch<TPolRingType> ffs= FiniteFieldSearch<TPolRingType>(hurwitzMapSearchProblem, searchOptions, *ring);
-
-                assert( getIrredCount(1, field->getCardinality() ) == 7 );
-                std::cerr  << "ffs.getIrredCount(2)" <<  getIrredCount(2, field->getCardinality()) << std::endl;
-                assert( getIrredCount(2, field->getCardinality()) == 21 );
-                assert( getIrredCount(3, field->getCardinality()) == 112 );
-
-                ffs.run();
-
-                assert( ffs.getCounter() == 1280160 );
-
-             
-                
-                hmf.finiteFieldSearch(hurwitzMapSearchProblem, searchOptions, *ring);
-                //hmf.finiteFieldSearch(hurwitzMapSearchProblem, searchOptions, characteristic=7 );
-                     return;
-            }
-
-            static void solve43222(int charac)
-            {
-                //std::vector< Shape::ScalarType >    partition = { 4,3,2,2,2 }; requires initializer lists   c++0x
-                // std::vector< Shape::ScalarType >    partition = { 3,3,3,2,2 }; 
-
-
-                int ar[]={ 4,3,2,2,2 };
-                const int TotalItems = sizeof(ar)/sizeof(ar[0]);
-                std::vector< Shape::ScalarType >    partition(ar, ar+TotalItems);
-           
-                Shape shape(partition);
-                
-                std::vector< Shape >  preShapeList(3,partition);
-                
-                ShapeList   shapeList(preShapeList);
-                HMSProblem  hurwitzMapSearchProblem(shapeList);
-
-                assert(hurwitzMapSearchProblem.getNormalizationRuleList().getNormalizationRuleListAsVector().size()>0);
-    
-                bool dryRun,logStructure,strictNormalization;
-
-                const SearchOptions   searchOptions=SearchOptions( dryRun=false, 
-                                                                    logStructure=true, 
-                                                                    strictNormalization=false, 
-                                                                     RationalMapSearch::OutputMode::M2Output   
-                                                              
-                                                                );
-                //const SearchOptions   searchOptions=SearchOptions( dryRun=false, logStructure=false, strictNormalization=false);
-                HurwitzMapFinder    hmf;
-                int characteristic = charac;
-                  
-              const  TPolRingType::RingType* field = new   TPolRingType::RingType(characteristic,0);
-                const   TPolRingType * ring = new TPolRingType(*field);
-
-                hmf.finiteFieldSearch(hurwitzMapSearchProblem, searchOptions, * ring );
-                //hmf.finiteFieldSearch(hurwitzMapSearchProblem, searchOptions, characteristic=7 );
-                return;
-            }
- 
-
-            //------------------------ 
-            //  1 11  1     9 1       13  3  4 3 2 2 2 0 4 3 2 2 2 0 4 3 2 2 2 0 
-
-            //------------------------  { (11 7 5 4 3 2^3),  (3^12), (2^18 )}
-
-            //  3  5  1    1 3 1    0 2    36   3  11 7 5 4 3 2 2 2  0   3 3 3 3 3 3 3 3 3 3 3 3 0  2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 0  # 488569597440   # noch machbar
-            //  3  7  1    1 4 1    0 3    36   3  11 7 5 4 3 2 2 2  0   3 3 3 3 3 3 3 3 3 3 3 3 0  2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 0  # 848877404860800 # schon zu schwer: faktor 100 fehlt         
-            
-
-            //------------------------ { (1^7  29), (3^12), (2^18 )}
-            //  3  3  1    1 1 1    0 2    36   3  1 1 1 1 1 1 1 29 0   3 3 3 3 3 3 3 3 3 3 3 3 0 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 0   # 492568168
-            //  3  5  1    1 3 1    0 2    36   3  1 1 1 1 1 1 1 29 0   3 3 3 3 3 3 3 3 3 3 3 3 0  2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 0  # 20140838436064 # gerade noch machbar
-            //  3  5  1    1 3 1    0 2    36   3  1 1 1 1 1 1 1 29 0   2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 0  3 3 3 3 3 3 3 3 3 3 3 3 0  # 319533755920577952 
-            //  3  7  1    1 4 1    0 3    36   3  1 1 1 1 1 1 1 29 0   3 3 3 3 3 3 3 3 3 3 3 3 0  2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 0  # 18925417228717488      
-            //  3  11  1    1 9 1    0 2    36   3  1 1 1 1 1 1 1 29 0   3 3 3 3 3 3 3 3 3 3 3 3 0  2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 2 0 # 170504511106086922360
-
-            //--------------------- { (1^5 21),  (3^8 2), (2^13) }
-            // 3  3  1    1 1 1    0 2  26   3    1 1 1 1 1 21 0 3 3 3 3 3 3 3 3 2 0 2 2 2 2 2 2 2 2 2 2 2 2 2 0      # 566256
-            //  3  5  1    1 3 1    0 2   26   3    1 1 1 1 1 21 0 3 3 3 3 3 3 3 3 2 0 2 2 2 2 2 2 2 2 2 2 2 2 2 0    # 1243688928
-            //  3  7  1      1 4 1    0 3   26   3    1 1 1 1 1 21 0 3 3 3 3 3 3 3 3 2 0 2 2 2 2 2 2 2 2 2 2 2 2 2 0  # 168884296848
-            //   3  11  1    1 9 1    0 2  26   3    1 1 1 1 1 21 0 3 3 3 3 3 3 3 3 2 0 2 2 2 2 2 2 2 2 2 2 2 2 2 0   # 111017632038720 # geschwindigkeitsfaktor 10 fehlt.
-  
-
-            //---------------------  { (7 5 4 3^2 2) ,( 3^8), (2^12) }
-
-            //  3  3  1    1 1 1    0 2    24   3  7 5 4 3 3 2  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0  # count : 22560
-            //  3  5  1    1 3 1    0 2    24   3  7 5 4 3 3 2  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0      #  93201120
-            //  3  5  1    1 3 1    0 2    24   3  3 3 3 3 3 3 3 3  0    2 2 2 2 2 2 2 2 2 2 2 2 0  7 5 4 3 3 2 0     # 95931929420224 and also characteristic too small, needs slow multiplicity check
-            //  3  7  1    1 4 1    0 3    24   3  7 5 4 3 3 2  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0   # 16034945760
-            //  3  7  1    1 4 1    0 3    24   3  3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0  7 5 4 3 3 2 0    #  125280700756918104, and also characteristic too small, needs slow multiplicity check
-            //  3  11  1    1 9 1    0 2   24   3  7 5 4 3 3 2  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0   # 11004081580800
-            //  3  11  1    1 9 1    0 2   24   3  3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0  7 5 4 3 3 2 0     # 1806941616406887141260  
-
-            //---------------------- { (7 5 4 3 2^2 1) , (3^8), (2^12) }
-            //  3  3  1    1 1 1    0 2    24   3  7 5 4 3 2  2 1  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0 # 0
-            //  1  5  1     3 1     24   3  7 5 4 3 2  2 1  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0  # 147415680
-            //  1  7  1     4 1     24   3  7 5 4 3 2  2 1  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0  # 50705740800
-            //  1  11  1    9 1     24   3  7 5 4 3 2  2 1  0   3 3 3 3 3 3 3 3  0 2 2 2 2 2 2 2 2 2 2 2 2 0 # 75157785014400
-
-            //---------------
-            //  1  7  1    1 4 1    0 3  3 4     2 1 0    2 1 0    2 1 0    2 1 0    1
-
-            static void testSchuett()
-            {
-          
-              /*  Shape shape1 ={ 7,5,4,3,3,2 };
-                Shape shape2 = { 3,3,3,3,3,3,3,3 };
-                Shape shape3 = { 2,2,2,2,2,2,2,2,2,2,2,2 } ;
-            */
-
-                int ar1[]={ 7,5,4,3,3,2 };
-                const int TotalItems1 = sizeof(ar1)/sizeof(ar1[0]);
-                std::vector< Shape::ScalarType >    shape1data(ar1, ar1+TotalItems1);
-
-                int ar2[]={ 3,3,3,3,3,3,3,3 };
-                const int TotalItems2 = sizeof(ar2)/sizeof(ar2[0]);
-                std::vector< Shape::ScalarType >    shape2data(ar2, ar2+TotalItems2);
-
-                int ar3[]={ 2,2,2,2,2,2,2,2,2,2,2,2 } ;
-                const int TotalItems3 = sizeof(ar3)/sizeof(ar3[0]);
-                std::vector< Shape::ScalarType >    shape3data(ar3, ar3+TotalItems3);
-
-                 std::vector< Shape > preshapeList ;
-                preshapeList.push_back(Shape(shape1data));
-                preshapeList.push_back(Shape(shape2data));
-                preshapeList.push_back(Shape(shape3data));
-
-                
-                ShapeList   shapeList (preshapeList) ;
-
-                /* using initializer lists
-                ShapeList   shapeList(  { 7,5,4,3,3,2 },  
-                                        { 3,3,3,3,3,3,3,3 } , 
-                                        { 2,2,2,2,2,2,2,2,2,2,2,2 } 
-                                     );
-                */
-
-
-                HMSProblem  hurwitzMapSearchProblem(shapeList);
-
-                assert(hurwitzMapSearchProblem.getNormalizationRuleList().getNormalizationRuleListAsVector().size()>0);
-    
-                bool dryRun,logStructure,strictNormalization;
-
-                 const SearchOptions   searchOptions=SearchOptions( dryRun=true,
-                                                                     logStructure=false, 
-                                                                     strictNormalization=false, 
-                                                                     RationalMapSearch::OutputMode::M2Output  // requires  nested enumerators 
-                                                                   );
-                // const SearchOptions   searchOptions=SearchOptions( dryRun=false, logStructure=false, strictNormalization=false);
-                HurwitzMapFinder    hmf;          // 4,3,2,2,2 char =23 :  103347928992
-                                                                 
-                //int characteristic = 7;                         //   scharf: 130 Std., keine Beispiele...
-                // int characteristic = 5;                             //      20616540, keine Beispiele
-                //int characteristic = 11;                       //     8014067740800 (mit genauen irreduziblen polynomen, 17321min)  
-                                            // unsers mith char =23      103347928992
-                // char 13                                             87611161223520
-                                                        // char 7         20931320340
-                                              
-                int characteristic = 13;
-          
-                const  TPolRingType::RingType* field = new   TPolRingType::RingType(characteristic,0);
-                const   TPolRingType * ring = new TPolRingType(*field);
-                hmf.finiteFieldSearch(hurwitzMapSearchProblem, searchOptions, *ring );
-               
-            }
-        
-    
-    };
-
-
-};
-
-#include "HurwitzMapFinder.hpp"
-
-
-/*
-//deg 36 example char 7:
-18925417228717488
-char 5:
-20140838436064
-char 3:
-492568168
-char 11:
-4483814442700957816
-
-165781036554829200 
-11004081580800 //7 5 4 3 3 2 0
-111017632038720 // deg26 char 11
-75157785014400 // 7543221 0
-7562712967133163520 //deg36 char 13
-3822308396606137632 //deg36 char 13 erstes beispiel.
-
-3695170689490405488 // deg26 char 23
-111017632038720 // deg26 char 11
-
-
-*/
-
-/* rfs liefert:
-{ 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1} =>825330
-{ 1, 1, 1, 1, 1, 1} =>11
-{ 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1} =>58468
-{ 2, 1, 1, 1, 1} =>1
-{ 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1} =>7383
-{ 2, 2, 2, 1, 1, 1, 1, 1, 1, 1} =>1254
-{ 2, 2, 2, 2, 1, 1, 1, 1, 1} =>166
-{ 2, 2, 2, 2, 2, 1, 1, 1} =>23
-{ 2, 2, 2, 2, 2, 2, 1} =>1
-{ 3, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1} =>7609
-{ 3, 2, 1, 1, 1, 1, 1, 1, 1, 1} =>368
-{ 3, 2, 2, 1, 1, 1, 1, 1, 1} =>58
-{ 3, 2, 2, 2, 1, 1, 1, 1} =>10
-{ 3, 2, 2, 2, 2, 1, 1} =>2
-{ 3, 3, 1, 1, 1, 1, 1, 1, 1} =>127
-{ 3, 3, 2, 1, 1, 1, 1, 1} =>13
-{ 3, 3, 2, 2, 1, 1, 1} =>1
-{ 3, 3, 3, 1, 1, 1, 1} =>7
-{ 3, 3, 3, 3, 1} =>1
-{ 4, 1, 1, 1, 1, 1, 1, 1, 1, 1} =>1080
-{ 4, 2, 1, 1, 1, 1, 1, 1, 1} =>42
-{ 4, 2, 2, 1, 1, 1, 1, 1} =>4
-{ 4, 2, 2, 2, 1, 1, 1} =>2
-{ 4, 3, 1, 1, 1, 1, 1, 1} =>4
-{ 4, 4, 1, 1, 1, 1, 1} =>3
-{ 5, 1, 1, 1, 1, 1, 1, 1, 1} =>164
-{ 5, 2, 1, 1, 1, 1, 1, 1} =>10
-{ 5, 2, 2, 1, 1, 1, 1} =>2
-{ 6, 1, 1, 1, 1, 1, 1, 1} =>14
-{ 6, 2, 1, 1, 1, 1, 1} =>2
-
-*/
diff --git a/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.hpp b/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.hpp
deleted file mode 100644
index 5d9ee16..0000000
--- a/sandbox/hurwitz.kroeker/src/HurwitzMapFinder.hpp
+++ /dev/null
@@ -1,1138 +0,0 @@
-#pragma once
-
-#include "PolynomialShape.h"
-#include "FactorPolynomialWrapper.h"
-#include "DebugLogger.h"
-
-namespace RationalMapSearch 
-{
-
-    template <class TPolRingTypePar>
-    std::list< PolynomialFactorBluePrint>     FiniteFieldSearch<TPolRingTypePar>::createPolFactorBlueprintList(  )
-            {   
-
-                 const ShapeList & shapelist = hurwitzMapSearchProblem_m.getConstShapeListRef();
-
-                 std::list< PolynomialFactorBluePrint> polfactorBlueprintList;
-
-                 for (short shapepos=0; shapepos<=1; shapepos++ )
-                 {
-                    Shape::MultiplicityDegreeHashType  muldegrep = shapelist[shapepos].getMultiplicityDegreeRep();
-                    Shape::MultiplicityDegreeHashType::const_iterator it;
-                    for ( it = muldegrep.begin(); it != muldegrep.end(); it++ )
-                    {   
-                            //std::cerr <<  (*it).first<< "^" <<(*it).second << std::endl;
-                            const PolynomialFactorBluePrint bp( (*it).first, (*it).second, shapepos);
-                            //std::cerr << bp<< std::endl;
-                            polfactorBlueprintList.push_back(bp);
-                    }
-                }   
-                return polfactorBlueprintList;
-            }
-
-             
-        template <class TPolRingTypePar>
-            FiniteFieldSearch<TPolRingTypePar>::FiniteFieldSearch(const HMSProblem & hms_, const SearchOptions& so, 
-                                                                                     const TPolRingTypePar &  polynomialRing): hurwitzMapSearchProblem_m( hms_),
-                                                                                                            searchOptions_m( so ),
-                                                                                                            outputHandler_m(NULL),
-                                                                                                            characteristic_m( polynomialRing.getCoeffRing().getCharacteristic() ),
-                                                                                                          
-                                                                                                            //polynomialRing_m( getPolRingRef(characteristic ) ),
-                                                                                                            polynomialRing_m(polynomialRing),
-                                                                                                            field_m( polynomialRing.getCoeffRing() )
-                                                                                                        
-                                                                                                         
-            {
-                mpz_init(counter_m);
-                mpz_init(counterMod_m);
-                mpz_set_ui(counter_m,0);
-                mpz_set_ui(counterMod_m,1);
-   
-                setPolRingRef( & polynomialRing );
-
-                assert(hms_.getNormalizationRuleList().getNormalizationRuleListAsVector().size()>0);
-                assert(hurwitzMapSearchProblem_m.getNormalizationRuleList().getNormalizationRuleListAsVector().size()>0);
-
-                IrreduciblePolTableType * irredPolTablePtr;
-               
-                irredPolTablePtr = getIrredPolTablePtr( field_m.getCharacteristic() );           
-
-
-		DebugLogger::logStream() << "# constructionMaxFactorDegree " << hurwitzMapSearchProblem_m.getShapeList().getConstructionMaxFactorDegree() << std::endl;
-
-		// todo: print for HMSProblem.
-                //std::cerr << "constructionMaxFactorDegree " << hurwitzMapSearchProblem_m.getShapeList().getConstructionMaxFactorDegree() << std::endl;
-
-                if ( not   searchOptions_m.dryRun() )
-                    irredPolTablePtr->updateIrredPolList ( hurwitzMapSearchProblem_m.getShapeList().getConstructionMaxFactorDegree() );
-                else
-                    irredPolTablePtr->updateIrredPolList ( 1 );
-
-
-                for (size_t pos=0; pos< hurwitzMapSearchProblem_m.getMinimalPolynomials().size() ;pos++)
-                {
-                   typename TPolRingTypePar::ElementType pol = convertPolRepToRingElem( hurwitzMapSearchProblem_m.getMinimalPolynomials()[pos] );
-                    minimalPolynomials_m.push_back(pol);
-                }
-                
-                
-                
-                if (searchOptions_m.outputMode()==OutputMode::GAPOutput)  //requires nested enumerators
-                     outputHandler_m = new GAPOutputHandler<PolynomialSet<TPolRingTypePar> >();
-                else if (searchOptions_m.outputMode()==OutputMode::M2Output)  //requires nested enumerators
-                      outputHandler_m = new M2OutputHandler<PolynomialSet<TPolRingTypePar> >();
-                //else
-                //    outputHandler_m= new EmptyOutputHandler<PolynomialSet<TPolRingTypePar> >();
-                assert( outputHandler_m != NULL);
-		DebugLogger::logStream() << " FiniteFieldSearch initialized!" << std::endl;
-              }
-
-            /// convention: polRep is a vector with polynomial coefficients and polrep[i] is the coefficient of monomial x^i .
-            template <class TPolRingTypePar>
-            typename TPolRingTypePar::ElementType   FiniteFieldSearch<TPolRingTypePar>::convertPolRepToRingElem(const typename  HMSProblem::PolynomRepType & polRep) const
-            {
-                    typename TPolRingTypePar::ElementType pol( polRep.size() -1 );
-                    for (size_t pos=0; pos< polRep.size(); pos ++)
-                    {
-                        pol.setCoeff( pos, field_m.Convert( polRep[pos] ) );
-                    }
-                    return pol;
-            }
- 
-            template <class TPolRingTypePar>
-            std::list< PolynomialFactorBluePrint>   FiniteFieldSearch<TPolRingTypePar>::createPolFactorConstructionRules(std::vector<int > partition, uint exponent, uint destpolynomial)
-            {
-                std::list< PolynomialFactorBluePrint> polFactorConstructionRuleList;
-        
-                for (size_t pos = 0; pos<partition.size() ; pos++)
-                {
-                   polFactorConstructionRuleList.push_back(PolynomialFactorBluePrint(exponent, partition[pos], destpolynomial) );
-                }
-                return polFactorConstructionRuleList;
-            }
-
-            // extract a PolynomialFactorBluePrint to which is is possible to apply the Normalization rule.
-            template <class TPolRingTypePar>
-            PolynomialFactorBluePrint*  FiniteFieldSearch<TPolRingTypePar>::extractMatchingRule(std::list< PolynomialFactorBluePrint> &polFactorConstructRules, NormalizationRule rule)
-            {
-                    //std::cerr << "extractMatchingRule" << std::endl;
-
-                    PolynomialFactorBluePrint * res=NULL;
-
-                    polFactorConstructRules.sort( PolynomialFactorBluePrint::minDegreeMaxMultiplicityLower );
-                    std::list< PolynomialFactorBluePrint>::iterator it;
-
-                    // wenn man erase benutzt, kann man  keine for-schleife verwenden.
-                    it = polFactorConstructRules.begin();
-                    while ( it != polFactorConstructRules.end()  )
-                    {
-                        /*if ( rule.matches( (*it).polynomialId_m, (*it).multiplicity_m ) )
-                        {
-                            std::cerr << "(*it).polynomialId_m" << (*it).polynomialId_m << std::endl;
-                            std::cerr << "(*it).multiplicity_m" << (*it).multiplicity_m << std::endl;
-                            std::cerr << "matches";
-                        }*/
-                           
-                        if ( rule.matches( (*it).polynomialId_m, (*it).multiplicity_m ) &&   (*it).degree_m==1 )
-                        
-                        {   
-                            res = new PolynomialFactorBluePrint( (*it) );                     
-                            //std::cerr << "polFactorConstructRules size" << polFactorConstructRules.size() << std::endl;
-                            it = polFactorConstructRules.erase(it);
-                            //std::cerr << "polFactorConstructRules size" << polFactorConstructRules.size()<< std::endl;
-                            return res;
-                        }
-                        else
-                            it++;
-                    }                 
-                  
-                    return res;
-            }
-
-            template <class TPolRingTypePar>
-            bool     FiniteFieldSearch<TPolRingTypePar>::computeScalingFactors(const PolSetType &  polSet,   std::vector<  typename TPolRingTypePar::CoeffRingType::ElementType > & scalingFactors)
-            {
-                
-                assert( polSet.size()>2 );
-                scalingFactors.resize( polSet.size()-2 );
-
-                bool computed=false;
-
-                for ( size_t pos = 2; pos<polSet.size(); pos++ )
-                {
-                    computed=false;
-                    for (int coeff = 1; coeff< field_m.getCharacteristic(); coeff++)
-                    {
-                        typename TPolRingTypePar::ElementType pol= polynomialRing_m.add(polSet[1], polynomialRing_m.scalarMultiply( field_m.Convert(coeff), polSet[0] ));
-                        if (pol==polSet[pos])
-                        {
-                            scalingFactors[pos-2] = field_m.addInv(field_m.Convert(coeff));
-                            computed=true;
-                            break;
-                        }
-                    }
-                    if (! computed)
-                     break;
-                }
-                return computed;
-            }
-
-
-            /*
-              for alphaFactorPos in 1..#alphaFactors-1 do
-            (
-                currScalingFactor:= alphaFactors#alphaFactorPos;
-                if (normalizedByFirstScalar) then
-                    currScalingFactor=currScalingFactor*(alphaFactors#0)^-1;
-                if (sub (minPolyList#(alphaFactorPos-1),matrix {{ currScalingFactor}} )!=0 ) then
-                (
-            */
-
-            
-
-            /// @todo: polSetBlueprint wird nur gebraucht, wenn man auch eine Liste der Faktoren mitführen will
-            template <class TPolRingTypePar>
-            bool    FiniteFieldSearch<TPolRingTypePar>::processNormalizationRules( PolSetBlueprintType & polsetblueprint, 
-                                                                                    std::list< PolynomialFactorBluePrint> &polFactorConstructRules,
-                                                                                    std::vector<int> & degreeOneRootList,
-                                                                                    ShapeList & shapeList,
-                                                                                    FiniteFieldSearch<TPolRingTypePar>::PolSetType & polSet )
-            {
-                NormalizationRuleList   nrl = hurwitzMapSearchProblem_m.getNormalizationRuleList();
-               
-                std::vector<NormalizationRule>  nrlvec = nrl.getNormalizationRuleListAsVector();
-
-                assert(nrlvec.size()>0);
-
-                IrreduciblePolTableType & irredPolTableRef = getIrredPolTableRef( field_m.getCharacteristic() );
-                
-
-                std::vector<NormalizationRule>::iterator it =nrlvec.begin();
-
-   
-            
-                while (  it != nrlvec.end() )
-                {
-                    //overwrite polynomialId if polynomialId>=2)
-                    if ( (*it).getPolynomialId()>=2 || ! hurwitzMapSearchProblem_m.strictNormalization() )
-                    {
-                        (*it).clearPolynomialId(  );
-                        (*it).clearExponent(  );
-                    }
-                    it++;
-                }
-                it = nrlvec.begin();
-            
-                while (  it != nrlvec.end() )
-                {
-                     PolynomialFactorBluePrint * polFactorBlueprint_p = extractMatchingRule( polFactorConstructRules, (*it) );
-                     if ( polFactorBlueprint_p !=NULL)
-                     {
-                            const size_t polynomialId = (* polFactorBlueprint_p).polynomialId_m;
-                            if ((*it).getValue() != NormalizationValue::infinity) 
-                            {    
-                                const typename IrreduciblePolTableType::IrredVecListType &  irredVecList =  irredPolTableRef.getIrredPolList((* polFactorBlueprint_p).degree_m);
-                                std::vector<int>::iterator degOneVecIterator = degreeOneRootList.end();
-                                if ((*it).getValue()== NormalizationValue::one )
-                                {
-                                    degOneVecIterator = std::find(degreeOneRootList.begin(),degreeOneRootList.end(), 1 );
-                                    //std::cerr << "irredVecList[1] = " << irredVecList[1] << std::endl;
-                                    assert( polynomialRing_m.evalAt( *(irredVecList[1]), field_m.Convert(1))== TPolRingTypePar::RingType::ElementType::Zero);
-                                }
-                                if ((*it).getValue()== NormalizationValue::zero )
-                                {
-                                    degOneVecIterator = std::find(degreeOneRootList.begin(),degreeOneRootList.end(), 0 );
-                                    assert( polynomialRing_m.evalAt( *(irredVecList[0]), field_m.Convert(0))== TPolRingTypePar::RingType::ElementType::Zero);
-                                }
-                                assert(degOneVecIterator != degreeOneRootList.end() );
-                                degreeOneRootList.erase( degOneVecIterator );
-        
-                               typename  TPolRingTypePar::Element ringElem(typename  TPolRingTypePar::Element(1) ) ;
-                                assert(ringElem.getDegree()>0);
-                                // todo: problem: degree von polynomial
-                                assert((*it).getValue()== NormalizationValue::one || (*it).getValue()==  NormalizationValue::zero );
-                               
-                                ringElem.setCoeff(0,   TPolRingTypePar::RingType::ElementType::Zero );
-                                if ((*it).getValue()== NormalizationValue::one )
-                                    ringElem.setCoeff(0, field_m.addInv( TPolRingTypePar::RingType::ElementType::One ));
-                                ringElem.setCoeff(1, TPolRingTypePar::RingType::ElementType::One );
-                                if ((*it).getValue() == NormalizationValue::one )
-                                    assert(ringElem == *(irredVecList[1]) );
-                                if ((*it).getValue() == NormalizationValue::zero )
-                                    assert(ringElem == *(irredVecList[0]) );
-
-                                TPolFactorPowerType powfactor( ringElem, (* polFactorBlueprint_p).multiplicity_m );
-                                
-                                assert(polynomialId>=0 && polynomialId<polsetblueprint.size());
-                                polsetblueprint[ polynomialId].push_back( powfactor );
-                          
-                                polSet[ polynomialId ] = polynomialRing_m.multiply( polSet[ polynomialId ], polynomialRing_m.pow(ringElem, (* polFactorBlueprint_p).multiplicity_m )  );
-                            }
-                            else
-                            {
-                                //correct shapeList: remove infinity exponent since it is invisible for univariate polynomials .
-                                shapeList = shapeList.removeExponent( (* polFactorBlueprint_p).polynomialId_m, (* polFactorBlueprint_p).multiplicity_m );
-                            }
-                            it=nrlvec.erase(it);    
-                            
-                            delete polFactorBlueprint_p;
-                     }
-                     else
-                        it++;
-                }
-                if ( ! hurwitzMapSearchProblem_m.strictNormalization() || nrlvec.size()==0 )
-                    return true;
-                if ( hurwitzMapSearchProblem_m.strictNormalization() && nrlvec.size()==1 )
-                {   
-                    /// todo: setzt voraus, dass bei den Normalisierungsregeln als polynomialid nur 0,1,2 zugelassen ist!
-                    /// Wenn eine Normalisierungsregel übrig geblieben ist, ist das in Ordnung.
-                    if ( nrlvec[0].getPolynomialId()==2 ||  nrlvec[0].getPolynomialId()==NormalizationRule::dontcare ) 
-                        return true;
-                }
-                return false;
-            }
-
-
-            template <class TPolRingTypePar>
-            typename TPolRingTypePar::ElementType   FiniteFieldSearch<TPolRingTypePar>::getScalarFromInt(int val)   const
-            {
-                typename TPolRingTypePar::ElementType   scalar(0);
-                //a1.setCoeff(1, TPolynomialRing::RingType::ElementType::One );
-                scalar.setCoeff(0, val );
-                return scalar;
-            }
-
-            template <class TPolRingTypePar>
-            void        FiniteFieldSearch<TPolRingTypePar>::removeConstantFactorsInPlace(typename FiniteFieldSearch<TPolRingTypePar>::PolSetType &  polSet)   const
-            {
-                for (size_t pos =0;pos<polSet.size();pos++)
-                {
-                typename TPolRingTypePar::ElementType & pol=polSet[pos];
-                    polynomialRing_m.normalizeInPlace( pol );
-                }
-            }
-
-            template <class TPolRingTypePar>
-            template <typename TProduct>
-            bool    FiniteFieldSearch<TPolRingTypePar>::normalizationRuleMatches(const std::vector<TProduct> & prodVec , const NormalizationRule & nr,  int degree ) const
-            {             
-
-                int baseDegree=0;
-                int currDegree=0;
-
-                for (size_t prodVecPos = 0; prodVecPos< prodVec.size(); prodVecPos++ )
-                {
-                        if (  nr.getPolynomialId() != NormalizationRule::dontcare &&  nr.getPolynomialId()!=prodVecPos)
-                            continue;
-
-                    for (size_t factorPos = 0; factorPos< prodVec[prodVecPos].size(); factorPos++ )
-                    {
-
-                        typename TPolRingTypePar::Element el= prodVec[prodVecPos][ factorPos ].first();
-                        baseDegree = el.getDegree();
-                        
-                        if ( nr.getValue()== NormalizationValue::one || nr.getValue()== NormalizationValue::zero )
-                        {
-                            int normVal=0;
-                            if ( nr.getValue()== NormalizationValue::one )
-                                normVal=1;
-
-                            if ( nr.getPolynomialId()==NormalizationRule::dontcare || nr.getPolynomialId()==prodVecPos   )
-                            {
-                                //std::cerr << "pos matches" << std::endl;
-                                if ( polynomialRing_m.evalAt( prodVec[prodVecPos][factorPos].first() , field_m.Convert(normVal) ) == TPolRingTypePar::RingType::ElementType::Zero)
-                                {
-                                    //std::cerr << "value matches" << std::endl;                                    
-                                    //return true;
-                                    if ( nr.getExponent()==NormalizationRule::dontcare || nr.getExponent()==prodVec[ prodVecPos ][ factorPos ].second() )
-                                    {
-                                        //std::cerr << "exponent matches" << std::endl;
-
-                                        return true;
-                                    }
-                                }
-                                
-                                    
-                            }
-                        }
-    
-                        currDegree += baseDegree*prodVec[prodVecPos][factorPos].second();
-                    }
-
-                    if ( nr.getValue()==NormalizationValue::infinity && currDegree< degree &&   
-                        ( nr.getPolynomialId()==NormalizationRule::dontcare || nr.getPolynomialId()==prodVecPos  ) )
-                    {
-                        //std::cerr << "infinity: value matches" << std::endl;
-                        return true;
-                    }
-
-                
-                }
-
-                return false;
-            }
-            
-            template <class TPolRingTypePar>
-            template <typename TProduct>
-            bool    FiniteFieldSearch<TPolRingTypePar>::normalizationRulesMatches(const std::vector<TProduct> & prodVec  ) const
-            {
-                NormalizationRuleList nrl = hurwitzMapSearchProblem_m.getNormalizationRules();
-                
-                assert( nrl.size()<=prodVec.size() );
-
-                bool allMatches=true;
-                for (size_t pos = 0; pos < nrl.size(); pos++ )
-                {
-                    bool  matches  = normalizationRuleMatches( prodVec, nrl[pos], hurwitzMapSearchProblem_m.getMapDegree() )  ;
-                    
-                    if ( not matches )
-                        return false;
-                  //     std::cerr << "rule "<< pos << " matches" << std::endl;
-                }
-                //std::cerr << "allMatches  "  << allMatches <<  std::endl;
-                //std::cerr << "--" <<  std::endl;
-                
-                return allMatches;
-            }
-
-            template <class TPolRingTypePar>
-            void  FiniteFieldSearch<TPolRingTypePar>::renormalize(  const ShapeList & shapeList,  FiniteFieldSearch<TPolRingTypePar>::PolSetType & polSetCopy )
-            {
-                    #ifdef VERBOSE
-                        std::cerr << "# renormalize " << std::endl;
-                        #endif
-
-                bool                  polSetMultiplicityStructureIsOk=true;
-
-                        typename FiniteFieldSearch<TPolRingTypePar>::PolSetType secondCopy = polSetCopy;
-                        
-                        typename TPolRingTypePar::ElementType substpol= typename TPolRingTypePar::ElementType(1)  ;  
-                        substpol.setCoeff(0,field_m.Convert(0));
-                        substpol.setCoeff(1,field_m.Convert(1));
-
-                        bool first=true;
-                        do 
-                        {
-  
-                            secondCopy[0] = polynomialRing_m.subst(polSetCopy[0],  substpol);
-                            secondCopy[1] = polynomialRing_m.subst(polSetCopy[1],  substpol);
-                            secondCopy[2] = polynomialRing_m.subst(polSetCopy[2],  substpol);
-                            if (first)
-                            {
-                                assert(secondCopy[0]==polSetCopy[0]);
-                                assert(secondCopy[1]==polSetCopy[1]);
-                                assert(secondCopy[2]==polSetCopy[2]);
-                                first=false;
-                            }
-                       
-                            // todo: define check as filter!
-                            if (  polynomialMatchesShapeStrict( secondCopy[0], polynomialRing_m, shapeList[0] ) )
-                            if (  polynomialMatchesShapeStrict( secondCopy[1], polynomialRing_m, shapeList[1] ) )
-                            if (  polynomialMatchesShapeStrict( secondCopy[2], polynomialRing_m, shapeList[2] ) )
-
-                            /// todo: gcd check is only correct for three critival values.
-                            if ( polynomialRing_m.fastgcd( secondCopy[0],secondCopy[1]).isConstant() )
-                            if ( polynomialRing_m.fastgcd( secondCopy[1],secondCopy[2]).isConstant() )
-                            if ( polynomialRing_m.fastgcd( secondCopy[0],secondCopy[2]).isConstant() )
-                        
-                            {
-                               typedef  Product< Power<TPolRingTypePar> > TProduct;
-                                std::vector <TProduct> prodVec;
-                                for (size_t prodVecPos =0; prodVecPos < secondCopy.size(); prodVecPos++)
-                                {
-                                       TProduct prod = FactorizerType::extendedFactorPolynomial<TPolRingTypePar>( secondCopy[prodVecPos], polynomialRing_m );
-                                       prodVec.push_back(prod);
-                                }
-                              
-                                // now check if prod_i mathes the normalization Rule for the   polynomial i.
-                             
-                                if ( ! normalizationRulesMatches(  prodVec ) )
-                                    continue;
-    
-                               
-
-                                #ifdef VERBOSE
-                                std::cerr << "substpol " << substpol<< std::endl;
-                                #endif
-
-                                for ( size_t polpos=0; polpos<polSetCopy.size(); polpos++)
-                                    secondCopy[polpos]= polynomialRing_m.subst(  polSetCopy[polpos], substpol );
-
-                                std::vector< typename CoeffRingType::ElementType >    scalingRelations ;
-
-                                if ( ! computeScalingFactors(secondCopy, scalingRelations))
-                                {
-                                    #ifdef VERBOSE
-                                    std::cerr << "failed to compute scaling factors" << std::endl;
-                                    #endif
-                                    continue;
-                                }
-                            
-                                // check B-A==C: (lambda =1 !);
-                                assert( secondCopy[2] == polynomialRing_m.add( secondCopy[1], polynomialRing_m.addInv( secondCopy[0]) ) ) ;
- 
-                                #ifdef VERBOSE
-                                for  (size_t spos=0;spos<scalingRelations.size(); spos++)
-                                    std::cerr << "scaling factor [ " << spos << "] = " << scalingRelations[spos] << std::endl;
-                                #endif
-                                
-                                if (     minimalPolynomials_m.size()>0)
-                                {   
-                                   
-                                    // optional:
-                                    // removeConstantFactorsInPlace( polSetCopy );
-                                    // normalizeInPlace( polSetCopy );
-                                    // normalize
-                                    // then compute and apply scaling factors.
-                                    //
-                                    // removeConstantFactorsInPlace( polSetCopy );
-
-                                    for (size_t minPolPos=0; minPolPos<minimalPolynomials_m.size(); minPolPos++)
-                                    {   
-                                        /// todo: eigentlich weiss nur ein Ring, ob ein Element=0 ist oder nicht ...bisher falsch umgesetzt...
-                                        if (not polynomialRing_m.evalAt(minimalPolynomials_m[minPolPos], 
-                                                                        field_m.multiply(scalingRelations[minPolPos+1] ,
-                                                                                                    field_m.multInv(scalingRelations[0] )
-                                                                                                )
-                                                                        ).isZero() 
-                                            )
-                                        {
-                                            polSetMultiplicityStructureIsOk = false;
-                                            break;
-                                        }
-                                    }
-                                }
-                            
-                                if (! polSetMultiplicityStructureIsOk)   continue;       
-                    
-                        
-                                #pragma omp critical    
-                                {
-
-                                    //localCounter++ ;
-                                    #ifdef VERBOSE
-                                    std::cerr << "found solution : " << std::endl;
-                                    std::cerr << secondCopy[0] << std::endl;
-                                    std::cerr << secondCopy[1] << std::endl;
-                                    std::cerr << secondCopy[2] << std::endl;
-                                    #endif
-                                
-                                    /// ensure that all polynomial coefficient lists have the same size:
-                                    /// @todo: this should be a part of polSetObject 
-                                    /// @todo : use everywhere field_m.getZero() and field_m.getOne() for 0 and 1 or similar. 
-                                    /*for (size_t polId=0;    polId< secondCopy.size();polId++)
-                                    {
-                                        secondCopy[polId].setDegree( shapeList.getDegree() );
-                                        //for  (size_t missingcoeffPos = secondCopy[polId].size();  missingcoeffPos<  shapeList.getDegree();      missingcoeffPos++)
-                                        //       secondCopy[polId].push_back( field_m.getZero() );                               
-                                    }*/
-        
-                                    ////
-                                      PolynomialSet<TPolRingTypePar>  polSetObject=PolynomialSet<TPolRingTypePar>( hurwitzMapSearchProblem_m,
-                                                                                 searchOptions_m,
-                                                                                 polynomialRing_m,
-                                                                                 secondCopy  
-                                                                                );
-
-                                    outputHandler_m->print( polSetObject );
-                                    solutionCandidates_m.push_back( secondCopy );
-                                    
-                                }
-                                if ( not searchOptions_m.allNormalizations() )
-                                    break;
-                            }
-
-                        }
-                        while ( substpol.nextInPlace(field_m) );
-            }
-
-            ///@note es ist zwar prinzipiell egal, ob das Zweite Polynom als Nullstelle inf hat, aber um konstante Faktoren be den Polynomen zu vermeiden,
-            /// sollte das schon so gehandhabt werden.            
-            template <class TPolRingTypePar>
-            void  FiniteFieldSearch<TPolRingTypePar>::last_search_level(  const ShapeList & shapeList,  FiniteFieldSearch<TPolRingTypePar>::PolSetType & polSet )
-            {
-                //std::cerr << "last_Search_Level" << std::endl;  
-
-                size_t mid = shapeList.size()-2; 
-
-         
-                size_t nonzeroesNum =  field_m.getCharacteristic()-1 ;
-
-                if (mid>nonzeroesNum) 
-                //    return 0;
-                return;
-
-                if (   searchOptions_m.dryRun() )
-                    assert( false ); //should not happen
-                //    return 1;
-
-                //CounterType localCounter=0;
-                #ifdef SAFE
-                    assert( polynomialMatchesShape( polSet[0], polynomialRing_m, shapeList[0] ) );
-                    assert( polynomialMatchesShape( polSet[1], polynomialRing_m, shapeList[1] ) );
-                #endif
-
-             ScalarCombinationType    nonzeroes;
-                /// todo: the nonzeroes should be provided by the field_m (e.g. a galois field) 
-                nonzeroes = ScalarCombinationType( field_m.getCharacteristic()-1 );
-
-                for (int num=1; num< field_m.getCharacteristic(); num++)
-                    nonzeroes[num-1]=num;
-            
-                ScalarCombinationType   combination(mid);
-              
-
-                for (size_t i=0; i< mid ; i++)
-                    combination[i] = i;
- 
-                 int tmpCombSize = 32;
-
-                std::vector<ScalarCombinationType > tmpCombinations;
-                tmpCombinations =  std::vector<ScalarCombinationType >(tmpCombSize);
-                
-
-                /// checking all examples means walk through all nonzero combinations of size mid. 
-                /// To parallelize the computations a portion of tmpCombSize=64 combinations is computed and then distributed to all local CPU's by OpenMP
-                /// The first idea was to compute a list of all combinations and then parallelize, but that could result in a problem since for greater characteristic and 
-                /// a lot of branch points the size of the combinations explodes combinatorically
-                /// parallelizing the computation across a computer cluster needs more serious thought.
-                bool done = false;
-                while (!done)
-                {
-                    for (int counter=0; counter<tmpCombSize; counter++)
-                    {
-                        tmpCombinations[counter] = combination;
-                        done = ! naive_next_combination_vec( nonzeroesNum, mid , combination);
-                        if (done)
-                        {
-                            tmpCombinations.resize(counter+1);
-                            break;
-                        }
-                    }
-                    tmpCombSize = tmpCombinations.size();                
-
-                    // es is nicht sehr effizient, die innerste Schleife zu parallelisieren 
-                    // wenn die Anzahl der Verzweigungen nicht zu gross ist, sollte die Größe von nonzeroCombinationVector_m nicht explodieren.
-                    //#ifdef OPENMP
-                    //    #pragma omp parallel for
-                    //#endif
-
-                    for (int combinationPos = 0; combinationPos< tmpCombSize ; combinationPos++)      
-                    {
-
-                        typename FiniteFieldSearch<TPolRingTypePar>::PolSetType polSetCopy;
-                       
-                        polSetCopy = polSet;
-                        
-                        bool polSetMultiplicityStructureIsOk=true;
-                        
-                        combination = tmpCombinations[ combinationPos ] ;
-
-                        for (size_t pos=0; pos<mid; pos++)
-                        {
-                            typename TPolRingTypePar::Element secondSummand =  polynomialRing_m.multiply( getScalarFromInt( nonzeroes[combination[ pos ] ] ),
-                                                                                                        polSetCopy[0] 
-                                                                                                    ) ;
-            
-                            // wieso eigentlich additiveInverse?
-                            //polSetCopy[pos+2] = polynomialRing_m.addInv( polynomialRing_m.add (polSetCopy[0],  secondSummand )      );
-                            polSetCopy[pos+2] =  polynomialRing_m.add (polSetCopy[1],  secondSummand )  ;
-
-                            if (searchOptions_m.logStructure() )
-                            {
-                                Shape::ShapeRepType tmpShapeRep =  computeMultiplicityStructure<TPolRingTypePar,Shape::ShapeRepType>( polSetCopy[2], polynomialRing_m ) ;
-                                assert(tmpShapeRep.size()>0);
-                                Shape logShape = Shape(tmpShapeRep);
-                                std::string key = logShape.toString();
-    
-                                #pragma omp critical    
-                                {
-                                    if ( logShape.getDegree() != shapeList.getDegree() )
-                                    {
-                                        //std::cerr << "logged shape degree " << logShape.getDegree()<< std::endl;
-                                        //std::cerr << "shapeList degree " << shapeList.getDegree()<< std::endl;
-                                        //std::cerr << " unextected shape degree  "  << logShape << std::endl << polSetCopy[2] << std::endl;
-                                        //getchar();
-                                    }
-                                    if ( singleStructureHashmap_m.find(key) == singleStructureHashmap_m.end() )
-                                            singleStructureHashmap_m.insert(std::pair<std::string, uint64_t> (key,1));
-                                        else 
-                                            singleStructureHashmap_m[key]++;
-                                    if ( fullStructureHashmap_m.find(key) == fullStructureHashmap_m.end() )
-                                            fullStructureHashmap_m.insert(std::pair<std::string, uint64_t> (key,1));
-                                        else 
-                                            fullStructureHashmap_m[key]++;
-                                }
-                            } 
-
-
-    
-                            // check multiplicityStructure of polSetCopy[pos+2]
-                            if ( ! polynomialMatchesShape( polSetCopy[pos+2], polynomialRing_m, shapeList[pos+2] ) )
-                            {
-                                polSetMultiplicityStructureIsOk=false;
-                                break;
-                            }
-                            
-                        }
-
-                        
-        
-                    
-                        if (!polSetMultiplicityStructureIsOk) continue;
-                        //#pragma omp critical
-                        {
-                            //localCounter++;
-                        }
-
-                         // passe W_inf an.
-                         polSetCopy[0]=   polynomialRing_m.addInv(polynomialRing_m.multiply( getScalarFromInt( nonzeroes[combination[ 0 ] ] ),
-                                                                                            polSetCopy[0] 
-                                                                                        ) 
-                                                                  );
-
-
-                        #ifdef VERBOSE
-                        std::cerr << "found solution candidate" << std::endl;
-                        #endif
-                        // check multiplicityStructure of polSetCopy[0] and polSetCopy[1] and gcd (polSet[0], polSet[0]) 
-                        // because in case preudoIrreduciblePolynomial lists are used, the multiplicityStructure may be wrong 
-                        // or gcd (polSet[0], polSet[0]) not a constant! Both conditions are mandatory!
-                        
-                        // BUT concider following: 
-                        // when checking polynomials fast, the characteristic has to be of sufficient size depending on the destination polynomial shape
-                        // otherwise a slower factorization is required to get the correct result
-                        // since polSetCopy[0] and polSetCopy[1] may have a shape that is not testable in a fast way
-                        // a factorization is required here for a correct result. 
-                        
-                        if ( ! polynomialMatchesShapeStrict( polSetCopy[0], polynomialRing_m, shapeList[0] ) )
-                         continue;
-
-                      
-
-                        if ( ! polynomialMatchesShapeStrict( polSetCopy[1], polynomialRing_m, shapeList[1] ) )
-                              continue;
-
-                      
-                        
-                            typename TPolRingTypePar::ElementType gcdf = polynomialRing_m.fastgcd(polSetCopy[0],polSetCopy[1]);
-                            if ( !gcdf.isConstant() )
-                                 continue;
-                        
- 
-                                    
-                                        
-                        #ifdef VERBOSE
-                        std::cerr << " pre solution (not normalized) " << std::endl;
-                        std::cerr << polSetCopy[0] << std::endl;
-                        std::cerr << polSetCopy[1] << std::endl;
-                        std::cerr << polSetCopy[2] << std::endl;
-                        #endif
-
-
-                        renormalize(shapeList,polSetCopy);
-                      
-                    }// end for 
-               } //end while not done
-                //return localCounter ;
-                return;
-            }
-
-
-            //weitere idee: die sortedPolFactorConstructRules so sortieren, dass oben die Liste mit dem größten grad ist und nur das erste mal parallelisieren.
-            template <class TPolRingTypePar>
-            void    FiniteFieldSearch<TPolRingTypePar>::third_search_level( const std::vector< std::pair<int,const BPVecTYPE * > > &  sortedPolFactorConstructRules,
-                                                                            const std::vector<int> &    degreeOneRootList,
-                                                                            const ShapeList & shapeList,
-                                                                            std::vector< std::pair<int, const BPVecTYPE * > >::const_reverse_iterator    mapIterator,
-                                                                            FiniteFieldSearch<TPolRingTypePar>::PolSetType & polSet,
-                                                                            mpz_t tmpCounterPar, mpz_t localCounter)
-            {   
-                    //std::cerr << "third_Search_Level" << std::endl;
-		   mpz_t tmpCounter;
-            
-    
-                    if ( mapIterator==sortedPolFactorConstructRules.rend() )
-                    {
-                        //#pragma omp critical
-                       
-
-                        if (   searchOptions_m.dryRun() )
-                        {
-			     
-			      mpz_init( tmpCounter );
-			      mpz_set(tmpCounter, tmpCounterPar);
-
-			    {
-			      mpz_init( localCounter );
-			    }
-                            mpz_set( localCounter, tmpCounter );
-                            size_t mid = shapeList.size()-2; 
-                            mpz_t tmpMpz;
-                            mpz_init( tmpMpz );
-                        
-                            for (size_t tmp =field_m.getCardinality()-1; tmp> field_m.getCardinality()-1 - mid ;tmp--)
-                            {
-                                 mpz_set_ui( tmpMpz,tmp );
-                                 mpz_mul(localCounter, localCounter, tmpMpz);
-                            }
-                            return;
-                            
-                        }
-                        last_search_level(shapeList, polSet);
-                        return  ;
-                    }
-                    else
-                    {
-                     
-                       int degree = (*mapIterator).first;       
-                         
-                       const BPVecTYPE  & polFactorConstRuleList = *((*mapIterator).second);
-
-                        mapIterator++;
-
-                       size_t mid =   polFactorConstRuleList.size()  ;
-
-                       size_t   irredListSize;
-
-                        if (   searchOptions_m.dryRun() )
-                        {
-			      
-			      mpz_init( tmpCounter );
-			      mpz_set(tmpCounter, tmpCounterPar);
-			      
-                                mpz_t irredListSizeMpz;
-                                mpz_init( irredListSizeMpz );
-                                getIrredCount( degree, field_m.getCardinality(), irredListSizeMpz );
-                                
-                                 if (degree==1)
-                                    {
-                                        mpz_set_ui(irredListSizeMpz, degreeOneRootList.size() );
-                                    }
-
-                                irredListSize = mpz_get_ui(irredListSizeMpz);
-                                getIrredCount( degree, field_m.getCardinality() ); // will assert if irredListSize to big
-
-                                //int irredListSizeDebug = mpz_get_ui(irredListSizeMpz);
-                                //assert(irredListSizeDebug==irredListSize);
-
-
-                                #ifdef VERBOSE
-                                std::cerr << "degree " << degree << std::endl;
-                                std::cerr << "irredListSize " << irredListSize << std::endl;
-                                #endif
-
-                                mpz_t midMpz;
-                                mpz_init( midMpz );
-                                mpz_set_ui(midMpz,mid);
-
-                                if ( mpz_cmp(midMpz,irredListSizeMpz)>0 ) 
-                                {
-                                    mpz_init( localCounter );
-                                    return;
-                                }
-                                
-                                mpz_t tmpMpz;
-                                mpz_init( tmpMpz );
-                                mpz_t tmpCmpMpz;
-                                mpz_init( tmpCmpMpz );
-                                mpz_set(tmpMpz,irredListSizeMpz);
-                               
-                                mpz_add(tmpCmpMpz,tmpMpz,midMpz);
-
-                                mpz_t minusOneMpz;
-                                mpz_init( minusOneMpz );
-                                mpz_set_si(minusOneMpz,-1);
-                            
-                                while ( mpz_cmp(tmpCmpMpz, irredListSizeMpz)>0 )
-                                {
-                                    mpz_mul( tmpCounter, tmpCounter,tmpMpz ); 
-                                    mpz_add(tmpMpz,tmpMpz,minusOneMpz);
-                                    mpz_add( tmpCmpMpz,tmpMpz,midMpz); // tmpCmpMpz=tmp+mid
-                                  
-                                    
-                                };
-                                /*for (size_t  tmp = irredListSize; tmp>irredListSize-mid; tmp-- )
-                                {
-                                    mpz_set_ui(tmpMpz,tmp);
-                                    mpz_mul(tmpCounter, tmpCounter,tmpMpz);   
-                                }*/
-
-                                mpz_t tmpCounterCopy;
-                                mpz_init(tmpCounterCopy);
-                                mpz_set(tmpCounterCopy,tmpCounter);
-
-                                third_search_level(sortedPolFactorConstructRules, degreeOneRootList, shapeList, mapIterator, polSet, tmpCounterCopy, localCounter);        
-                                return;
-                        }
- 
-    
-                      const IrreduciblePolTableType * irredPolTablePtr= getIrredPolTableConstPtr( field_m.getCharacteristic() );    
-                        const typename IrreduciblePolTableType::IrredVecListType &  irredVecList =  irredPolTablePtr->getIrredPolList(degree);
-                       
-
-                        /// note: irredListSize, mid , combination must have the same type for working naive_next_combination!
-                       
-                        irredListSize = irredVecList.size();
-                  
-
-                        if (degree==1)
-                            irredListSize= degreeOneRootList.size();
-
-           
-                        if ( mid>irredListSize ) 
-                        {
-                            #ifdef VERBOSE
-                            std::cerr << "degree " << degree << std::endl;
-                            std::cerr << "irredListSize " << irredListSize << std::endl;
-                            std::cerr << "polFactorConstRuleListSize " << mid << std::endl;
-                            #endif
-                            return ;//return 0;
-                        }
- 
-                        ScalarCombinationType combination( mid );
-                            for (size_t i=0; i< mid ; i++)
-                                combination[i] = i;
-
-                        ///todo: bei dry run: zähle einfach Kombinationen und permutationen anstatt alle durchzulaufen. DONE
- 
-                        int tmpCombSize = 64;
-                        std::vector<ScalarCombinationType > tmpCombinations(tmpCombSize);
-
-                        bool done = false;
-                        
-                        while (!done)
-                        {
-                            for (int counter=0; counter<tmpCombSize; counter++)
-                            {
-                                tmpCombinations[counter] = combination;
-                                done = ! naive_next_combination_vec( irredListSize, mid , combination);
-                                if (done)
-                                {
-                                    tmpCombinations.resize(counter+1);
-                                    break;
-                                }
-                            }
-                        
-                            tmpCombSize = tmpCombinations.size();
-
-                        
-                            //#ifdef OPENMP
-                            //    #pragma omp parallel for  reduction(+: localCounter)
-                            //#endif
-                            #ifdef OPENMP
-                                #pragma omp parallel for 
-                            #endif
-
-                            // idee: laufe alle combinations durch; integer in der combination sind indices für die irreducible liste...
-                            // falls es sich um deg1 irred handelt, doppelte indirektion:  irredlist[ degreeOneRootList[pos] ]
-                            for (int combinationPos = 0; combinationPos< tmpCombSize ; combinationPos++)      
-                            {
-                                // for each permutation...
-                                size_t permutation[ mid ];
-                                for (size_t i=0; i< mid ; i++)  permutation[i] = tmpCombinations[combinationPos] [i];
-                                
-                                do 
-                                {
-                                    if ( not searchOptions_m.dryRun() )
-                                    {
-                                           std::vector<typename TPolRingTypePar::ElementType> polSetCopy( polSet.begin(), polSet.end() ) ;
-                                        assert( polSet.size()>0 );
-                                        assert( polSetCopy.size()>0 );
-                                        // here: construct polynomials: apply all rules from polFactorConstRuleList.
-                                        for (size_t rulePos = 0 ;  rulePos < polFactorConstRuleList .size(); rulePos++ )  
-                                        {
-                                            #ifdef SAFE
-                                                assert( polFactorConstRuleList[rulePos].polynomialId_m < polSetCopy.size() );
-                                                assert(  polFactorConstRuleList[rulePos].polynomialId_m >= 0 );
-                                            #endif
-                                            typename TPolRingTypePar::ElementType & polRef = polSetCopy[ polFactorConstRuleList[rulePos].polynomialId_m ];
-                                            if (degree==1)
-                                                polRef =  polynomialRing_m.multiply(  polRef ,polynomialRing_m.pow( *(irredVecList[ degreeOneRootList[permutation[rulePos ]] ]), polFactorConstRuleList[rulePos].multiplicity_m)  )  ;
-                                            else
-                                                polRef =  polynomialRing_m.multiply(  polRef ,polynomialRing_m.pow( *(irredVecList[permutation[rulePos ] ]), polFactorConstRuleList[rulePos].multiplicity_m)  )  ;
-                                            
-                                        }
-                                          third_search_level(sortedPolFactorConstructRules, degreeOneRootList, shapeList, mapIterator, polSetCopy, tmpCounter,localCounter );    
-                                    }
-                                    else
-                                    {
-                                        third_search_level(sortedPolFactorConstructRules, degreeOneRootList, shapeList, mapIterator, polSet, tmpCounter,localCounter);    
-                                    }
-    
-                                } while (next_permutation (permutation, permutation + mid ) );
-                                
-                            
-                            }// end for   
-                        }// end while !done
-                     }// end not all construction rule processed.
-                    return;
-            }
-
-            
-            template <class TPolRingTypePar>
-            void    FiniteFieldSearch<TPolRingTypePar>::second_search_level(std::list< PolynomialFactorBluePrint> polFactorConstructRules)
-            {
-
-                #ifdef VERBOSE
-                std::cerr << "second_Search_Level" << std::endl;
-                #endif
-                std::list< PolynomialFactorBluePrint>::iterator it;
-                
-                /*for (it=polFactorConstructRules.begin(); it != polFactorConstructRules.end(); it++)
-                {
-                    std::cout << (*it) << std::endl;
-                }*/
-                
-                PolSetBlueprintType polsetblueprint;
-                polsetblueprint.resize( hurwitzMapSearchProblem_m.getPolSetSize() );
-
-                #ifdef VERBOSE
-                std::cerr << " polFactorConstructRules.size() = " << polFactorConstructRules.size() << std::endl;
-                #endif
-                std::vector<int>  degreeOneRootList;
-
-                for (int num= 0; num< field_m.getCharacteristic();num++)
-                     degreeOneRootList.push_back(num);
-
-                ShapeList modifiedShapeList = hurwitzMapSearchProblem_m.getShapeList();
-
-                        
-                PolSetType  polSet(modifiedShapeList.size(), TPolRingTypePar::ElementType::getOne()  );
-                //assert( TPolRingTypePar::ElementType::One.isOne() );
-                assert( TPolRingTypePar::ElementType::getOne().isOne() );
-                assert( polSet.size()>0 ); 
-                if ( processNormalizationRules( polsetblueprint, polFactorConstructRules, degreeOneRootList, modifiedShapeList, polSet) )
-                {
-                    // sort 
-                    for (it=polFactorConstructRules.begin(); it != polFactorConstructRules.end(); it++)
-                    {
-                        #ifdef VERBOSE
-                        std::cerr << (*it) << std::endl;
-                        #endif
-			DebugLogger::logStream() << (*it) << std::endl;
-                    }
-                
-                    std::list< PolynomialFactorBluePrint>::iterator it;
-                    DegSortedConstructionRuleTableType   sortedPolFactorConstructRules;
-
-                    for (it=   polFactorConstructRules.begin();it!=polFactorConstructRules.end();it++)
-                    {
-               
-                        if (sortedPolFactorConstructRules.find( (*it). degree_m )==sortedPolFactorConstructRules.end())
-                        {
-                            sortedPolFactorConstructRules[(*it). degree_m]=   std::vector< PolynomialFactorBluePrint>();
-                        }
-                        sortedPolFactorConstructRules[(*it). degree_m].push_back( *it );
-                    }
- 
-          
-                    std::vector< std::pair<int, const BPVecTYPE *> >  sortedPolFactorConstructRulesVec;
-
-                DegSortedConstructionRuleTableType::iterator dit = sortedPolFactorConstructRules.begin();
-                while (dit!=sortedPolFactorConstructRules.end())
-                {
-
-                    int degree = (*dit).first;
-                    const BPVecTYPE * vecbp = &((*dit).second);
-                    std::pair<int, const BPVecTYPE* > pp (degree, vecbp);
-                     //sortedPolFactorConstructRulesVec.push_back( std::pair<int,BPVecTYPE > (degree, vecbp ) );
-                    sortedPolFactorConstructRulesVec.push_back( pp );
-                    dit++;
-                }
-
-                    std::vector< std::pair<int, const BPVecTYPE * > >::const_reverse_iterator mapIterator = sortedPolFactorConstructRulesVec.rbegin();
-                
-                    mpz_t tmpCounter;
-                    mpz_init(tmpCounter); 
-                    mpz_set_ui(tmpCounter,1);
-                    mpz_t counterMpz;
-                    third_search_level( sortedPolFactorConstructRulesVec , degreeOneRootList, modifiedShapeList, mapIterator, polSet ,tmpCounter, counterMpz );
-
-                    
-                    #pragma omp critical
-                    {
-                        if (searchOptions_m.dryRun())
-                        {
-                            mpz_add( counter_m, counter_m, counterMpz );
-                            if ( mpz_cmp(counter_m , counterMod_m )   >0)
-                            {
-                                #ifdef VERBOSE
-                                //std::cerr << " counter_m = " << counter_m << " ! " << std::endl;
-                                //std::cerr << " counter_m = " << counter_m << " ! " << std::endl;
-                                
-                                #endif
-                                mpz_mul_ui(counterMod_m,counterMod_m,10);
-                                //counterMod_m *= 10;
-                            }
-                        }
-                    }
-                }
-                else
-                    assert(false);
-            }
-
-            template <class TPolRingTypePar>
-            void    FiniteFieldSearch<TPolRingTypePar>::first_search_level( std::list< PolynomialFactorBluePrint>     polfactorBlueprintList,  
-                                      std::list< PolynomialFactorBluePrint>   polFactorConstructRules)
-            {    
-               
-                if (polfactorBlueprintList.size()==0)
-                {
-                    second_search_level(polFactorConstructRules);
-                    printStructureMap(singleStructureHashmap_m);
-                    singleStructureHashmap_m.clear();
-                }
-                else
-                {
-                    PolynomialFactorBluePrint bp = polfactorBlueprintList.front();
-    
-                    polfactorBlueprintList.pop_front();
-
-                    std::vector<int> partition ( bp.degree_m ,1);
-                    do 
-                    {
-                        std::list< PolynomialFactorBluePrint>  polFactorConstructRulesCopy=polFactorConstructRules,
-                     
-                        currentPolFactorConstructRules  = createPolFactorConstructionRules( partition, bp.multiplicity_m ,bp.polynomialId_m);
-
-                        polFactorConstructRulesCopy.splice( polFactorConstructRulesCopy.end(), currentPolFactorConstructRules);
-                        first_search_level(polfactorBlueprintList, polFactorConstructRulesCopy );
-                    }
-                    while (next_partition_desc( & partition )) ;
-                }
-           
-            }
-           
-            template <class TPolRingTypePar>
-            void    FiniteFieldSearch<TPolRingTypePar>::run()   
-            {
-                //counter_m = 0;  
-                mpz_set_ui(counter_m,0);
-                #ifdef VERBOSE
-                std::cerr << "run()" << std::endl;
-                #endif
-                std::list< PolynomialFactorBluePrint>    polfactorBlueprintList = createPolFactorBlueprintList(  ) ;
-
-                std::list< PolynomialFactorBluePrint> polFactorConstructRules;
-
-                if (! searchOptions_m.dryRun() )
-                    outputHandler_m->startOutput();
-                
-                first_search_level(polfactorBlueprintList, polFactorConstructRules);
-
-                if (! searchOptions_m.dryRun() )
-                    outputHandler_m->finishOutput();      
-            }
-
-              template <class TPolRingTypePar>
-              FiniteFieldSearch<TPolRingTypePar>::~FiniteFieldSearch()
-            {
-                delete outputHandler_m;
-
-            }
-
-}
-
-
diff --git a/sandbox/hurwitz.kroeker/src/IrreduciblePolTable.cpp b/sandbox/hurwitz.kroeker/src/IrreduciblePolTable.cpp
deleted file mode 100644
index b372095..0000000
--- a/sandbox/hurwitz.kroeker/src/IrreduciblePolTable.cpp
+++ /dev/null
@@ -1,111 +0,0 @@
-
-
-#include "IrreduciblePolTable.h"
-/*
-
-Folgender Plan:
-stat isIrred nur pseudo is irred.
-Dann für deg>3 ein iterator über (pseudo)irreduzible Polynome
-beim Ersten durchgang (pseudo)irreducible test und eine  Liste aufbauen.
-Es koennte aber auch sein, dass aufgrund der Speicherbeschaffenheit die Liste zu gross
-ist, nicht in den Cache passt und ein test/ Pseudo-test schneller ist. Also zumindest beide Varianten ausprobieren.
-
-Problem: je mehr faktoren vom gleichen irred-Grad in den ersten beiden Polynomen vorkommen können,
-desto eher lohnt es sich, die echte irreduzible liste anzulegen.
-
-- bereits verwendete Polynome aus den Listen nur für Grad 1 -2  streichen, ansonsten lohnt es sich nicht mehr
-(es sei denn, es gibt zu viele 'false positives' )
-Wenn man nicht alle verwendeten faktoren streicht, muss man bei einem Ergebniskandidaten 
-auch gcd(A,B)=1 gcd(A,C)=1 und gcd(B,C )=1 und zusätzlich den Shape von (A) und (B).
-
-
-
-Prototyp: erstelle in GAP eine Liste mit irreduziblen polynomen vom bestimmten Grad.
-
-
--probiere das 43222-Beispiel mit dem alten C++-Code zu finden, wobei nur Grad1-Faktoren zugelassen werden.
-
-
-*/
-
-namespace RationalMapSearch
-{
-
-    
-   
-
-    const IntFactorTable::IntType   IntFactorTable::MaxInt = 400 ; 
-
-    IntFactorTable::IntFactorTable()    
-    {
-        isPrime_m = new bool[ IntFactorTable::MaxInt ];
-    
-        isPrime_m[0]=false;
-        isPrime_m[1]=false;
-        for (uint n = 2; n < IntFactorTable::MaxInt; n++)
-            isPrime_m[n] = true;
-            for (uint n = 2; n < IntFactorTable::MaxInt; n++)
-            if (isPrime_m[n])
-            {
-                uint c=0;
-                for (uint m = 2; (c = m * n) < IntFactorTable::MaxInt; m++)
-                    isPrime_m[c] = false;
-            }
-
-        IntFactorVecType oneFactors(1,1);
-        intFactorTable_m.insert(std::pair< IntFactorTable::IntType, IntFactorVecType > ( 1, oneFactors ) );
-    }
-
-
-    IntFactorTable::IntFactorVecType  IntFactorTable::computeIntFactors(IntType integer)
-    {
-        assert( integer < IntFactorTable::MaxInt );
-        IntFactorVecType     res;
-    
-        for (IntType n = 2; n < IntFactorTable::MaxInt; n++)
-        {   
-            if (isPrime_m[n])
-            {
-                IntFactorTable::IntType c = 0;
-                for (IntType m = 1;   (c = m * n) <= integer; m++)
-                {
-                    c = m*n;
-                    if (c==integer) 
-                    {
-                        res.push_back(n);
-                        break;
-                    }
-                }
-            }
-                 
-        }
-        return res;
-    }
-  
-  
-
-   void IntFactorTable::test()
-            {
-                   IntFactorTable   ift;
-                   IntFactorTable::IntFactorVecType factorList = ift.getFactors(10);
-                   std::cerr << "factorList.size()" << factorList.size();
-                   std::cerr << "factorList[0]" << factorList[0];
-                   assert( factorList.size()==2 );
-
-                   factorList = ift.getFactors(7);
-                   assert( factorList.size()==1 );
-                   std::cerr << std::endl;
-                   std::cerr << "IntFactorTable test passed" <<  std::endl;
-            }
-
-
-    IntFactorTable::IntFactorVecType IntFactorTable::getFactors(IntType integer)
-            {
-                if ( intFactorTable_m.find(integer ) == intFactorTable_m.end() )
-                {
-                    addTableEntry(integer);
-                }
-                return intFactorTable_m[integer];
-            }
-
-}
\ No newline at end of file
diff --git a/sandbox/hurwitz.kroeker/src/IrreduciblePolTable.h b/sandbox/hurwitz.kroeker/src/IrreduciblePolTable.h
deleted file mode 100644
index e00ffa4..0000000
--- a/sandbox/hurwitz.kroeker/src/IrreduciblePolTable.h
+++ /dev/null
@@ -1,547 +0,0 @@
-#pragma once
-
- 
-#include <vector>
-#include <algorithm>
-#include <list>
-#include <assert.h>
-#include <cstdlib>
-#include <map>
-#include <ext/hash_map>
-#include <hash_map>
-#include <iostream>
-
-extern "C" {
-#undef __cplusplus
-    # include "nmod_poly.h"
-#define __cplusplus
-}
-
-
-#include "DebugLogger.h"
-
-
-namespace RationalMapSearch
-{
-        inline void  printMpz(mpz_t num)       
-            {                 
-                   
-                    char*  str= mpz_get_str( NULL, 10, num);
-                
-                    std::string counterStr  (str);
-                    
-                    std::cout << counterStr << ";" << std::endl;   
-                    delete[] str;
-            };
- 
-            inline void    getIrredCount(int degree, int cardinality, mpz_t result)   
-            {
-                //std::cerr << "getIrredCount (" << degree << ")" << std::endl;           
-                mpz_set_ui(result,0);
-                mpz_t tmp ;
-                mpz_init(tmp);  
-
-                for (int d =1; d<= degree; d++)
-                {
-                    if (degree % d ==0 )
-                    {
-                        mpz_set_ui(tmp,1);
-                        for (int dexp=d; dexp>0; dexp--)
-                        {
-                            mpz_mul_ui( tmp, tmp, cardinality );                         
-                        }
-                        int degd= degree/d;                                        
-                        int moebius = n_moebius_mu(degd);
-                        //mpz_set_si( tmp2, moebius );
-                        mpz_mul_si(tmp, tmp, moebius );
-
-                        mpz_add(result,result,tmp);
-                    }
-                }
-             
-                mpz_div_ui(result,result,degree);         
-                return  ;
-            }
-
-           
-            inline size_t    getIrredCount(int degree, int cardinality) 
-            {
-                mpz_t irredListSizeMpz;
-                mpz_init( irredListSizeMpz );
-                getIrredCount( degree, cardinality, irredListSizeMpz );
-                size_t result = mpz_get_ui ( irredListSizeMpz );
-                mpz_t tmp;
-                mpz_init( tmp );
-                mpz_set_ui( tmp,result );
-                
-                if ( mpz_cmp(tmp,irredListSizeMpz)==0 )
-                    return result;
-                else
-                {
-                    std::cerr << " too many irreducibles... ";
-                    assert(false);
-                }
-            }
-
-    /// @implementation only for the rational map search needs. Doesn't have to be efficient, because only factorisations of very small integers are required.
-    /// alternatively use FLINT or http://www.boo.net/~jasonp/qs.html or interface to an CAS.
-    class IntFactorTable
-    {
-
-        public:
-            typedef unsigned int IntType ;
-            typedef std::vector<IntFactorTable::IntType> IntFactorVecType ;        
-        
-            typedef std::map< IntType, IntFactorVecType >  IntFactorTableType;
-
-            static const IntType MaxInt  ;
-            
-             bool *  isPrime_m  ;
-
-            IntFactorTable()  ;
-
-        private:
-            IntFactorTableType  intFactorTable_m;
-
-            
-            IntFactorVecType computeIntFactors(IntType integer);
-          
-        
-            void addTableEntry(IntType integer)
-            {
-                  intFactorTable_m.insert(std::pair< IntFactorTable::IntType, IntFactorVecType > ( integer, computeIntFactors(integer) ) );
-            }
-            
-        public:
-
-            // todo: templatize return type?
-            IntFactorVecType getFactors(IntType integer);
-
-    
-            static void test();
-            
-
-    };
-
-  
-    //http://www.parashift.com/c++-faq-lite/pointers-to-members.html
-    // Zitat: use a Typedef for member functions !!!
-
-  ///deprecated
-  template <typename IrreduciblePolTableType>
-    class PseudoIrreducibleExpensiveTest
-    {
-        public:
-
-            static const bool threadsafe;
-
-            //typedef typename IrreduciblePolTableType::PolRingType    TPolRing;
-
-            //typedef typename TPolRing::ElementType  VecElemType;
-          
-              typedef bool (* IrredTesterFktType)(typename IrreduciblePolTableType::PolRingType::Element & , const typename IrreduciblePolTableType::PolRingType & ,   IrreduciblePolTableType & );
-
-          
-            inline static bool isIrreducible(typename IrreduciblePolTableType::PolRingType::Element & pol, const typename IrreduciblePolTableType::PolRingType & polRing,   IrreduciblePolTableType & irredTable)  
-            {
-                    typedef typename IrreduciblePolTableType::PolRingType    TPolRing;
-                    typedef typename  IrreduciblePolTableType::PolRingType::ElementType  VecElemType;
-
-                    int degree = pol.getExactDegree();
-                    
-                    // check if is Zero  pol(a= for a in 0...char coeffring
-                    const typename TPolRing::CoeffRingType & coeffRing = polRing.getCoeffRing();
-    
-                    for (int coeff = 0; coeff< coeffRing.getCharacteristic(); coeff++ )
-                    {
-                        if (  polRing.evalAt(pol, coeffRing.Convert(coeff)  )== TPolRing::RingType::ElementType::Zero) 
-                            return false;
-                    }               
-                    for (int currDegree= 2; currDegree<= degree /2 ;currDegree++)
-                    {
-                           typename IrreduciblePolTableType::IrredTableType & irredPolList = irredTable.getIrredPolList(currDegree);
-
-                           bool finished = false;
-                           #pragma omp parallel for shared(finished)
-                           for (int pos=0; pos< irredPolList.size();pos++)
-                           {
-                                if (!finished)
-                                {
-                                
-                                    typename TPolRing::Element gcdf = polRing.gcd( pol, *(irredPolList[pos])  );
-                                    if ( not gcdf.isConstant() )
-                                    {
-                                            finished=true;
-                                    }
-                                }
-                               
-                            }
-                            if (finished)
-                                    return false;
-                    
-                    }
-                    return true;
-            };
-
-    };
-
-    template <typename IrreduciblePolTableType>
-    const bool PseudoIrreducibleExpensiveTest<IrreduciblePolTableType>::threadsafe = true;
-
-    template <typename IrreduciblePolTableType>
-    class FLINTIrreducibleTest
-    {
-
-        public:
-
-            static const bool threadsafe ;
-
-            //typedef typename IrreduciblePolTableType::PolRingType    TPolRing;
-            //typedef typename TPolRing::ElementType  VecElemType;
-
-              typedef bool (* IrredTesterFktType)(typename IrreduciblePolTableType::PolRingType::Element & , const typename IrreduciblePolTableType::PolRingType & ,   IrreduciblePolTableType & );
-          
-            inline static bool isIrreducible(typename IrreduciblePolTableType::PolRingType::Element & pol, const typename IrreduciblePolTableType::PolRingType & polRing,   IrreduciblePolTableType & irredTable)  
-            {
-                    //std::cerr << "FLINT::isIrreducible" << std::endl;
-                    typedef typename IrreduciblePolTableType::PolRingType    TPolRing;
-                    typedef typename  IrreduciblePolTableType::PolRingType::ElementType  VecElemType;
-
-                    int degree = pol.getExactDegree();
-
-                      // pol.getCoeffRing()
-                    // check if is Zero  pol(a= for a in 0...char coeffring
-                    const typename TPolRing::CoeffRingType & coeffRing = polRing.getCoeffRing();
-
-                    nmod_poly_t x ;
-                    nmod_poly_init(x ,coeffRing.getCharacteristic() );
-    
-                    //typename TPolRing::Element::CoefficientType coeff = TPolRing::Element::CoefficientType::Zero;
-    
-                    for (int coeff = 0; coeff< coeffRing.getCharacteristic(); coeff++ )
-                    {
-                        if (  polRing.evalAt(pol, coeffRing.Convert(coeff)  )== TPolRing::RingType::ElementType::Zero) 
-                            return false;
-                    }               
-    
-                    // riscy: what if pol.getCoeff is not nonnegative?
-                    for (int currDegree= 0; currDegree<=degree; currDegree++)
-                    {
-                         assert( pol.getCoeff( currDegree).getX()>=0 );
-                         nmod_poly_set_coeff_ui(x,   currDegree,  pol.getCoeff( currDegree).getX() );
-                    }
-                    bool result = nmod_poly_is_irreducible(x);
-                    nmod_poly_clear (x);
-
-                       return result ;
-
-                    
-            };
-
-    };
-
-   template <typename IrreduciblePolTableType>
-    const bool FLINTIrreducibleTest<IrreduciblePolTableType>::threadsafe = true;
-
-
-
-   ///deprecated, checks only for linear and quadratic factors.
-   template <typename IrreduciblePolTableType>
-    class PseudoIrreducibleTest
-    {
-        public:
-
-            static const bool threadsafe;
-
-            typedef typename IrreduciblePolTableType::PolRingType    TPolRing;
-
-            typedef bool (* IrredTesterFktType)(typename IrreduciblePolTableType::PolRingType::Element & , const  typename IrreduciblePolTableType::PolRingType &,  IrreduciblePolTableType &);
-
-            
-            inline static bool isIrreducible(typename IrreduciblePolTableType::PolRingType::Element & pol, const typename IrreduciblePolTableType::PolRingType & polRing,  IrreduciblePolTableType & irredTable)  
-            {
-                    // check if is Zero  pol(a= for a in 0...char coeffring
-                    const typename  IrreduciblePolTableType::PolRingType::CoeffRingType & coeffRing = polRing.getCoeffRing();
-        
-                    for (int coeff = 0; coeff< coeffRing.getCharacteristic(); coeff++ )
-                    {
-                        if (  polRing.evalAt(pol, coeffRing.Convert(coeff)  )== TPolRing::RingType::ElementType::Zero) 
-                            return false;
-                    }               
-                    return true;
-            }
-    };
-    template <typename IrreduciblePolTableType>
-    const bool PseudoIrreducibleTest<IrreduciblePolTableType>::threadsafe = true;
-
-    // todo: factory class which creates IrreduciblePolTable. Eventually it is sufficient to derive classes instead template parametrizing.
-
-    // todo: in construct polynomial Set : somehow get rid of recursion if possible,
-    template <class TPolRing>
-    class IrreduciblePolTable
-    {
-
-        public:
-
-            typedef TPolRing    PolRingType;
-            typedef bool (* IrredTesterFktType)(typename IrreduciblePolTable<TPolRing>::PolRingType::Element & , const TPolRing & , IrreduciblePolTable<TPolRing> & );
-
-            typedef std::vector<const typename TPolRing::Element * > IrredVecListType;
-
-            typedef std::map< unsigned int, IrredVecListType >  IrredTableType;
-
-        private: 
-   
-        
-         TPolRing polRing_m;
-
-        typename TPolRing::CoeffRingType  coeffRing_m;
-        // TPolIrredTester irredTester_m;
-
-        //bool (* irredTester_m)(typename TPolRing::Element & , const TPolRing &  );
-
-            IrredTesterFktType  irredTester_m;
- 
-            IrredTableType      irredPolTable_m;
-
-        bool parallelize_m;
-
-
-        public:
-                IrreduciblePolTable( const TPolRing & polRing, 
-                                       IrredTesterFktType irredTester ) :  polRing_m(polRing),
-                                                                        coeffRing_m( polRing.getCoeffRing() ),
-                                                                      irredTester_m(irredTester),
-                                                                        parallelize_m(false)
-                {};
-                
-                IrreduciblePolTable( const TPolRing & polRing, 
-                                       IrredTesterFktType irredTester,
-                                        bool parallelize ) :  polRing_m(polRing),
-                                                                        coeffRing_m( polRing.getCoeffRing() ),
-                                                                      irredTester_m(irredTester),
-                                                                        parallelize_m(parallelize)
-                {};
-
-                IrreduciblePolTable( const TPolRing & polRing, 
-                                       IrredTesterFktType irredTester,
-                                        unsigned int maxDegree ) :  polRing_m(polRing),
-                                                                        coeffRing_m( polRing.getCoeffRing() ),
-                                                                        irredTester_m(irredTester),
-                                                                        parallelize_m(false)
-                {
-                    for (int deg = 1; deg<=maxDegree;deg++)
-                    {   
-		        size_t irredCount = getIrredCount( deg, polRing.getCardinality() );
-			DebugLogger::logStream() << "irredCount to compute for degree " << deg << " is " << irredCount << std::endl;
-                      
-                        computeIrredPolList(deg);
-                    }
-                };
-
-
-                IrreduciblePolTable( const TPolRing & polRing, 
-                                       IrredTesterFktType irredTester,
-                                        unsigned int maxDegree,
-                                        bool parallelize ) :  polRing_m(polRing),
-                                                                        coeffRing_m( polRing.getCoeffRing() ),
-                                                                        irredTester_m(irredTester),
-                                                                        parallelize_m(parallelize)
-                {
-                    for (int deg = 1; deg<=maxDegree;deg++)
-                    {   
-                        // just to make sure there are not too many irreducibles.
-                        size_t irredCount = getIrredCount( deg, polRing.getCardinality() );
-			DebugLogger::logStream() << "irredCount to compute for degree " << deg << " is " << irredCount << std::endl;
-                        computeIrredPolList(deg);
-                    }
-                };
-                
-                void computeIrredPolList(unsigned int degree)  
-                {
-                       
-                       #ifdef SAFE
-                        assert(degree>0);
-                       #endif
-                      if ( irredPolTable_m.find(degree ) == irredPolTable_m.end() )
-                      {          
-
-                            
-                            std::list< const typename TPolRing::Element *>    irredList;
-			    
-			    // TODO: it is possible to precompute the size of irredList, but then 
-			    // how it should be parallelized?
-                            if (degree==1) 
-                            {
-                                typename  TPolRing::Element irredPol(typename  TPolRing::Element(1) ) ;
-                                for (int root = 0; root<  coeffRing_m.getCharacteristic(); root++ )
-                                {                                
-                                    irredPol.setCoeff( 0, coeffRing_m.addInv( coeffRing_m.Convert(root) ) );
-                                    irredPol.setCoeff( 1, TPolRing::CoeffRingType::ElementType::One );
-                                    irredList.push_back( new  const typename TPolRing::Element ( irredPol)  ); 
-                                }           
-                            }
-                            else
-                            {
-                                // loop through all polynomials and check for Irreducibility.
-                                // 
-                                // two possibilities: either construct all polynomials first
-                                // or use nextPolynomial (will be slower.)
-                                // should decide which one to use by looking at the total count and memory usage
-                                typename TPolRing::Element   pol = typename TPolRing::Element(degree) ;
-                                // pol.SetCoeff( 0,TPolRing::Element::ElementType::One );
-                              
-                                
-                                pol.setCoeff( degree, TPolRing::CoeffRingType::ElementType::One );
-
-
-                                //parallelize_m=true;
-
-                                if (parallelize_m)
-                                {
-                                
-                                    size_t tmpVecSize=64;
-                                    std::vector< typename TPolRing::Element >    tmpPolVec(tmpVecSize,pol);
-                                    bool done = false;
-                                    while ( !done )
-                                    {
-                                        for (size_t i=0; i<tmpVecSize; i++)
-                                        {
-                                            tmpPolVec[i]=pol;
-                                            done = ! pol.nextInPlace( coeffRing_m, true);
-                                            if (done)
-                                            {
-                                                tmpPolVec.resize(i+1);
-                                                break;
-                                            }
-                                        }
-                                        #pragma omp parallel for shared(irredList)
-                                        for (size_t j = 0 ; j< tmpPolVec.size();j++) 
-                                        {
-                                            if ( irredTester_m( tmpPolVec[j], polRing_m, *this ) ) 
-                                            {
-                                                #pragma omp critical
-                                                irredList.push_back( new  typename TPolRing::Element ( tmpPolVec[j] ) ); 
-                                            }
-                                        }
-                                    }
-                                }
-                                else
-                                {
-                                    do  
-                                    {
-        
-                                            //std::cerr << "pol " << pol << std::endl;
-                                            //getchar();
-                                            // speed improvement: estimate number of irreducibles and use a vector instead of a list and then shrink the vector.
-                                            if ( irredTester_m( pol, polRing_m, *this ) ||  degree==1) 
-                                                irredList.push_back(  new const typename TPolRing::Element ( pol) ); 
-                                    }
-                                    while ( pol.nextInPlace( coeffRing_m, true) );        
-                                }                 
-                            }
-                            // now, copy the list to a vector. 
-                            //#pragma omp critical irredTable
-                            #ifdef VERBOSE
-                            std::cerr << "computed " << degree << std::endl;
-                            #endif
-			    DebugLogger::logStream() << "computed " << degree << std::endl;
-			    
-                            irredPolTable_m[degree]  = IrredVecListType( irredList.begin(), irredList.end() );  
-                            
-                      }
-                }
-
-                void updateIrredPolList(unsigned int degree)  
-                {
-                       #ifdef SAFE
-                        assert(degree>0);
-                       #endif
- 
-                        for (unsigned int deg=1; deg<=degree;deg++)
-                        {
-                            if ( irredPolTable_m.find( deg ) == irredPolTable_m.end() )
-                            {       
-                                computeIrredPolList(deg);
-                                #ifdef VERBOSE
-                                std::cerr << "irredPolTable_m[degree].size()" << irredPolTable_m[deg].size() <<  std::endl;
-                                #endif
-				DebugLogger::logStream() <<"irredPolTable_m[degree].size()" << irredPolTable_m[deg].size() <<  std::endl;
-                            }
-                        }
-                        
-                }
-
-             
-                const IrredVecListType * getIrredPolListPtr(unsigned int degree)  
-                {
-                       #ifdef SAFE
-                        assert(degree>0);
-                       #endif
-                     typename IrredTableType::const_iterator it=irredPolTable_m.find(degree);  
-                     assert( it!= irredPolTable_m.end() );
-                     return  ( &((*it).second) );
-                }
-                
-                const IrredVecListType & getIrredPolList(unsigned int degree)  const
-                {
-                    //std::cerr << "getIrredPolList (" << degree << ")" << std::endl;
-                    typename IrredTableType::const_iterator it=irredPolTable_m.find(degree);  
-                    #ifdef VERBOSE
-                    if (it == irredPolTable_m.end() )                     
-                        std::cerr << "getIrredPolList (" << degree << ")" << std::endl;
-                    #endif
-                    assert( it != irredPolTable_m.end() );
-                      return  ( (*it).second );
-                }
-            
-                static void test()
-                {
-                    int characteristic = 11;
-                    int epsPrecision = 0;
-
-                    ///@todo hier gibt es dublicate deletes, wenn coeffRing nicht als Pointer definiert wird !!!
-                    typename TPolRing::CoeffRingType *    coeffRing  = new typename TPolRing::CoeffRingType(characteristic, epsPrecision );
-                    TPolRing     polRing (*coeffRing);
-                    
-                   // IrreduciblePolTable poltable( polRing, PseudoIrreducibleTest<TPolRing>::isIrreducible ) ;
- 
-                    typedef IrreduciblePolTable<TPolRing> IrreduciblePolTableType;
-
-                   // typedef PseudoIrreducibleTest< IrreduciblePolTableType  > IrreducibleTestType;
-                   //typedef PseudoIrreducibleExpensiveTest< IrreduciblePolTableType  > IrreducibleTestType;
-
- 
-                    typedef FLINTIrreducibleTest< IrreduciblePolTableType  > IrreducibleTestType;
-                    //typedef GAPIrreducibleTest< IrreduciblePolTableType  > IrreducibleTestType;
-
-
-                   //  PseudoIrreducibleExpensiveTest< IrreduciblePolTable<TPolRing> >::IrredTesterFktType fkt= PseudoIrreducibleExpensiveTest< IrreduciblePolTable<TPolRing> >::isIrreducible< IrreduciblePolTable<TPolRing> >;
-                 
-
-                    IrreduciblePolTable<TPolRing> poltable( polRing, IrreducibleTestType::isIrreducible ) ;
-
-                    int maxDegree = 7;
-                    poltable.updateIrredPolList( maxDegree );
-
-                    for (int degree=1; degree < (maxDegree/ 2) ; degree++)
-                         poltable.getIrredPolList(degree);
-                   
-
-                
-                    assert( poltable.getIrredPolList(1).size()==11);
-                    assert( poltable.getIrredPolList(2).size()==55);
-                    assert( poltable.getIrredPolList(3).size()==440);
-                    
-                    
-                }
-        
-            virtual ~IrreduciblePolTable() 
-            {
-                // todo: free memory.
-            };
-
-    };
-
-
-}
\ No newline at end of file
diff --git a/sandbox/hurwitz.kroeker/src/Makefile.in b/sandbox/hurwitz.kroeker/src/Makefile.in
deleted file mode 100644
index 56eb58d..0000000
--- a/sandbox/hurwitz.kroeker/src/Makefile.in
+++ /dev/null
@@ -1,279 +0,0 @@
-#############################################################################
-##
-#W Makefile                                                 Laurent Bartholdi
-##                                                              Jakob Kroeker
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2007, Laurent Bartholdi
-##
-#############################################################################
-##
-##  This compiles the C/Java modules, creates archives, or
-##  compiles the documentation
-##
-#############################################################################
-
-.PHONY: all lib doc clean distribute mrproper wwwdir checkblocks tarballs
-
-LOCALBIN=bin/@TARGET@
-EXTERN=$(CURDIR)/bin/@TARGET@/extern
-
-CFLAGS=@CFLAGS@ -fPIC -std=c99 -Wall
-CC=@CC@ $(CFLAGS)
-
-JAVAC=@JAVAC@
-GAPPROG=@GAPPROG@
-GAC=@GAC@
-GSLLIB=gsl-1.15
-GIVAROLIB=givaro-3.6.0
-
-
-#############################################################################
-# lines added by jk:
-CXX=@CXX@ @CXXFLAGS@ $(CXXFLAGS)
-MPFRLIB=mpfr-3.1.0
-MPIRLIB=mpir-2.5.1
-FLINTLIB=flint-2.3-beta3
-FLINTEXTRACTDIR=flint-2.3
-#end changes by jk
-#############################################################################
-
-
-# changed by jk:
-#all: $(LOCALBIN) @LIB_TARGET@ $(LOCALBIN)/fr_dll.so @JAVABUILD@  
-all: $(LOCALBIN) @LIB_TARGET@ $(LOCALBIN)/fr_dll.so $(LOCALBIN)/hurwitzMapSearch @JAVABUILD@  
-
-
-
-lib:
-	echo "Make sure you downloaded extern/$(GSLLIB).tar.gz, extern/$(MPFRLIB).tar.bz2, extern/$(MPIRLIB).tar.bz2 and  extern/$(GIVAROLIB).tar.gz (instructions in extern/GET_LIBARIES)"
-	$(MAKE) gsllib
-	$(MAKE) givarolib
-	$(MAKE) mpirlib  # line added by jk
-	$(MAKE) mpfrlib  # line added by jk
-	$(MAKE) flintlib # line added by jk
-	
-
-#########################################################################
-# lines added by jk:
-
-extern/$(MPIRLIB).tar.bz2:
-	echo "I can't find $(MPIRLIB), so I'm going to download it"
-	(cd extern; wget --no-verbose http://www.mpir.org/$(MPIRLIB).tar.bz2)
-		
-		
-extern/$(MPFRLIB).tar.bz2:
-	echo "I can't find $(MPFRLIB), so I'm going to download it"
-	(cd extern; wget --no-verbose http://www.mpfr.org/$(MPFRLIB)/$(MPFRLIB).tar.bz2)
-
-
-extern/$(FLINTLIB).tar.gz:
-	echo "I can't find $(FLINTLIB), so I'm going to download it"
-	(cd extern; wget --no-verbose http://www.flintlib.org//$(FLINTLIB).tar.gz)
-	
-
-
-mpirlib: extern/$(MPIRLIB).tar.bz2
-	if ! test -r $(EXTERN)/include/mpir.h; then \
-	    cd extern && \
-	    tar -x -f $(MPIRLIB).tar.bz2 -j && \
-	    cd $(MPIRLIB) && \
-	    ./configure --enable-cxx --enable-shared --prefix=$(EXTERN) && \
-	    $(MAKE) yasm && \
-	    $(MAKE)      && \
-	    $(MAKE) install; \
-	fi
-#--enable-gmpcompat	
-	
-mpfrlib: extern/$(MPFRLIB).tar.bz2
-	if ! test -r $(EXTERN)/include/mpfr.h; then \
-	    cd extern && \
-	    tar -x -f $(MPFRLIB).tar.bz2 -j && \
-	    cd $(MPFRLIB) && \
-	    ./configure @WITHGMP@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-	
-
-# find ./ -type f -exec sed -i 's/<mpir.h>/<gmp.h>/' {} \; ; \
-# find ./ -type f -exec sed -i 's/lmpir/lgmp/' {} \; ; \
-	
-# currently flintlib depends on MPIR and cannot be substituted by GMP
-flintlib: mpirlib mpfrlib extern/$(FLINTLIB).tar.gz
-	if ! test -r $(EXTERN)/include/$(FLINTEXTRACTDIR)/fmpq_poly.h; then \
-	    cd extern && \
-	    rm -rf $(FLINTEXTRACTDIR) && \
-	    tar -x -f $(FLINTLIB).tar.gz -z && \
-	    cd $(FLINTEXTRACTDIR) && \
-	    ./configure @WITHMPIR@ @WITHMPFR@ --prefix=$(EXTERN) CFLAGS="@c_options@ "   && \
-	    $(MAKE) && \
-	    $(MAKE) install; \
-	fi
-#LDFLAGS="@LINKGMP@ @LINKMPFR"	 CFLAGS="$(CFLAGS) @c_options@" CXXFLAGS="$(CXXFLAGS) @c_options@"
-
-
-
-$(LOCALBIN)/timer.o: hurwitz/src/timer.C
-	$(CXX) -c $< -o $@
-
-$(LOCALBIN)/xyMonom.o: hurwitz/src/xyMonom.cc
-	$(CXX) -c $< -o $@
-
-$(LOCALBIN)/random.o: hurwitz/src/random.cpp
-	$(CXX) -c $< -o $@
-
-$(LOCALBIN)/HurwitzMapFinder.o: hurwitz/src/HurwitzMapFinder.cpp
-	$(CXX) -c $< -o $@			
-
-$(LOCALBIN)/IrreduciblePolTable.o: hurwitz/src/IrreduciblePolTable.cpp
-	$(CXX) -c $< -o $@	
-
-$(LOCALBIN)/NormalizationRules.o: hurwitz/src/NormalizationRules.cpp
-	$(CXX) -c $< -o $@	
-
-$(LOCALBIN)/Shape.o: hurwitz/src/Shape.cpp
-	$(CXX) -c $< -o $@	
-
-
-$(LOCALBIN)/OutputMode.o: hurwitz/src/OutputMode.cpp
-	$(CXX) -c $< -o $@	
-	
-	
-$(LOCALBIN)/DebugLogger.o: hurwitz/src/DebugLogger.cpp
-	$(CXX) -c $< -o $@	
-
-$(LOCALBIN)/rationalMapSearchForGAP.o: hurwitz/src/rationalMapSearchForGAP.cpp
-	$(CXX) -c $< -o $@			
-		
-$(LOCALBIN)/hurwitzMapSearch: $(LOCALBIN)/timer.o \
-                              $(LOCALBIN)/xyMonom.o \
-                              $(LOCALBIN)/random.o \
-                              $(LOCALBIN)/HurwitzMapFinder.o \
-                              $(LOCALBIN)/IrreduciblePolTable.o \
-                              $(LOCALBIN)/NormalizationRules.o \
-                              $(LOCALBIN)/Shape.o \
-                              $(LOCALBIN)/OutputMode.o \
-                              $(LOCALBIN)/DebugLogger.o \
-                              $(LOCALBIN)/rationalMapSearchForGAP.o 
-	$(CXX) -o $@  $+ @LDFLAGS@ -lflint
-
-# end changes by jk
-#########################################################################	
-
-
-
-extern/$(GSLLIB).tar.gz:
-	echo "I can't find $(GSLLIB), so I'm going to download it"
-	(cd extern; wget --no-verbose http://ftpmirror.gnu.org/gsl/$(GSLLIB).tar.gz)
-	
-	
-
-
-extern/$(GIVAROLIB).tar.gz:
-	echo "I can't find $(GIVAROLIB), so I'm going to download it"
-	(cd extern; wget --no-verbose --no-check-certificate https://forge.imag.fr/frs/download.php/202/$(GIVAROLIB).tar.gz)
-
-
-
-
-gsllib: extern/$(GSLLIB).tar.gz
-	if ! test -r $(EXTERN)/include/gsl/gsl_vector.h; then \
-	    cd extern && \
-	    rm -rf $(GSLLIB) && \
-	    tar -x -f $(GSLLIB).tar.gz -z && \
-	    cd $(GSLLIB) && \
-	    ./configure --prefix=$(EXTERN) CFLAGS="$(CFLAGS) @c_options@" && \
-	    $(MAKE) && \
-	    $(MAKE) install; \
-	fi
-
-
-givarolib: # disable for now, too hard to compile on MacOS systems
-	true
-
-__givarolib: extern/$(GIVAROLIB).tar.gz
-	if ! test -r $(EXTERN)/include/givaro-config.h; then \
-	    cd extern && \
-	    rm -rf $(GIVAROLIB) &&
-	    tar -x -f $(GIVAROLIB).tar.gz -z && \
-	    cd $(GIVAROLIB) && \
-	    ./configure @WITHGMP@ --prefix=$(EXTERN) && \
-	    $(MAKE) && \
-	    $(MAKE) install; \
-	fi
-
-distribute: wwwdir doc tarballs
-
-$(LOCALBIN):
-	mkdir -p $(LOCALBIN)
-
-$(LOCALBIN)/rpoly.o: src/rpoly.c src/poly.h
-	$(CC) -c $< -o $@
-
-$(LOCALBIN)/p1.o: src/p1.c src/cpoly.C src/fr_dll.h
-	$(CC) -c $< -o $@ -I@GAPDIR@ -I@GAPDIR@/$(LOCALBIN) -DCONFIG_H
-
-$(LOCALBIN)/fr_dll.o: src/fr_dll.c src/cpoly.C src/fr_dll.h
-	$(CC) -c $< -o $@ -I@GAPDIR@ -I@GAPDIR@/$(LOCALBIN) -DCONFIG_H
-
-$(LOCALBIN)/findrat.o: src/findrat.c src/fr_dll.h
-	$(CC) -c $< -o $@ -I@GAPDIR@ -I@GAPDIR@/$(LOCALBIN) -DCONFIG_H
-
-$(LOCALBIN)/fr_dll.so: $(LOCALBIN)/fr_dll.o $(LOCALBIN)/findrat.o $(LOCALBIN)/rpoly.o $(LOCALBIN)/p1.o
-	$(GAC) -d -o $@ $+ @GACFLAGS@
-	
-
-java/javaplot.class: src/javaplot.java
-	$(JAVAC) -cp java/javaview.jar $< -d java
-
-java/javaview.jar:
-	wget --no-verbose -O javaview.zip http://www.javaview.de/download/data/javaview.zip
-	unzip -j -d java javaview.zip jars/javaview.jar
-	rm -f javaview.zip
-
-clean:
-	rm -rf .version config.log $(LOCALBIN) `find doc -type l`
-
-configure: cnf/Makefile.in cnf/configure.ac
-	(cd cnf; autoconf; mv -f configure ..)
-
-mrproper: clean
-	rm Makefile
-
-.version: PackageInfo.g
-	grep '^Version :=' $< | awk -F'"' '{print $$2}' > $@
-
-wwwdir: .version tarballs
-	mkdir -p www
-	rm -f `find www -type l`
-	cp README www/README.fr
-	cp PackageInfo.g www/PackageInfo.g
-	ln -s chap0.html www/index.html
-	ln -sf fr-`cat .version`.tar.gz www/fr.tar.gz
-	cp doc/manual.pdf www/manual.pdf
-	(cd doc; for i in *.html; do cp $$i ../www/$$i; done)
-	cp doc/manual.css www/manual.css
-	rsync -arvp --delete www/ laurent@rlaurent.uni-math.gwdg.de:public_html/FR/
-
-doc: doc/chap0.html
-
-doc/chap0.html: doc/fr.xml doc/frbib.xml gap/algebra.gd gap/frelement.gd \
-	gap/group.gd gap/img.gd gap/perlist.gd gap/vector.gd gap/examples.gd \
-	gap/frmachine.gd gap/helpers.gd gap/mealy.gd gap/trans.gd
-
-	echo 'LoadPackage("fr"); DOC@FR();' | $(GAPPROG) -r -q
-
-checkblocks:
-	grep '<#GAPDoc' PackageInfo.g gap/*d | awk -F'"' '{print $$2}' | sort > @@-blocks
-	grep '<#Include' doc/fr.xml | awk -F'"' '{print $$2}' | sort > @@-in
-	comm -3 @@-blocks @@-in
-	@rm @@-blocks @@-in
-
-tarballs: .version doc
-	rm -rf www/fr
-	mkdir -p www
-	tar -c -f - --exclude '*~' --exclude 'config.[ls]*' --exclude 'fr/Makefile*' --exclude .cvsignore --exclude autom4te.cache --exclude sandbox --exclude www --exclude bin --exclude 'extern/[a-z]*' --exclude CVS --exclude .version -C .. fr | (cd www; tar -x -f -)
-	tar -c -f www/fr-`cat .version`.tar.gz -z -C www fr
-
-#E Makefile . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/src/NormalizationRules.cpp b/sandbox/hurwitz.kroeker/src/NormalizationRules.cpp
deleted file mode 100644
index ffe71e3..0000000
--- a/sandbox/hurwitz.kroeker/src/NormalizationRules.cpp
+++ /dev/null
@@ -1,186 +0,0 @@
-
-
-
-#include "NormalizationRules.h"
-/*#include <boost/function.hpp>
-#include <boost/lambda/lambda.hpp>
-#include <boost/foreach.hpp>
-#include <boost/bind.hpp> 
-#include <boost/lambda/if.hpp>
-*/
-
-namespace RationalMapSearch
-{    
-
-            const NormalizationValue NormalizationValue::infinity=NormalizationValue::createInfinityValue();
-            const NormalizationValue NormalizationValue::zero=NormalizationValue::createZeroValue();
-            const NormalizationValue NormalizationValue::one=NormalizationValue::createOneValue();
-
-            const int NormalizationRule::dontcare = -1 ; 
-
-            /// which polynomial to normalize  can be chosen arbitrarily if polynomialId==-1, same holds for exponent.
-            NormalizationRule::NormalizationRule(  int polynomialId, 
-                                int exponent,
-                                NormalizationValue  value):     polynomialId_m(polynomialId),  
-                                                                exponent_m(exponent),
-                                                                value_m(value)
-                                                                
-            {
-                assert(exponent_m>0 || exponent_m == NormalizationRule::dontcare );
-                // only first three polynomials considered as candidates for normalization.
-                assert( (polynomialId_m>=0 && polynomialId_m<3) ||  polynomialId_m == NormalizationRule::dontcare );
-            }
-    
-            void NormalizationRule::checkNormalizationRule(const ShapeList& shapelist) const
-            {
-                if (polynomialId_m>=0)
-                    assert((size_t)(polynomialId_m)< shapelist.size() );
-                if (polynomialId_m>=0 && exponent_m>0)     //dann muss der Exponent im entsprechenden Polynom auch vorkommen?
-                    assert(shapelist[polynomialId_m].hasExponent(exponent_m));            
-            }        
-
-            bool NormalizationRule::matches(const ShapeList& shapelist,int polynomialId ) const
-            {
-                    assert( polynomialId>=0  && (size_t)(polynomialId)< shapelist.size()  );               
-                    if (polynomialId==polynomialId_m || polynomialId_m== NormalizationRule::dontcare )
-                    {
-                        if (exponent_m== NormalizationRule::dontcare )
-                            return true;
-                        else
-                            return  shapelist[polynomialId].hasExponent(exponent_m);
-                    }
-                return false;
-            }
-
-            bool NormalizationRule::matches(const Shape& shape ) const
-            {
-                        if (exponent_m== NormalizationRule::dontcare )
-                            return true;
-                        else
-                            return  shape.hasExponent(exponent_m);
-            }
-
-            bool NormalizationRule::matches(int polynomialId , int exponent ) const
-            {   
-                    assert( polynomialId>=0 && exponent>0);
-                    if (polynomialId==polynomialId_m || polynomialId_m== NormalizationRule::dontcare )
-                    {
-                        if (exponent_m== NormalizationRule::dontcare || exponent==exponent_m)
-                            return true;
-                    }
-                return false;
-            }
-        
-        /*void    NormalizationRule::setPolynomialId(int polynomialId)  
-        {
-            assert( (polynomialId>=0 && polynomialId<3) ||  polynomialId == NormalizationRule::dontcare );
-
-            polynomialId_m=polynomialId;
-        }*/
- 
-        void    NormalizationRule::clearPolynomialId()
-        {     
-            polynomialId_m= NormalizationRule::dontcare ;
-        }
-
-        void    NormalizationRule::clearExponent()
-        {     
-            exponent_m= NormalizationRule::dontcare ;
-        }
-
-
-      int NormalizationRuleList::countValue(const std::vector<NormalizationRule>& nrl, NormalizationValue val)  
-    {
-        int count=0;
-        std::vector<NormalizationRule>::const_iterator it;
-        for (it= nrl.begin(); it!=nrl.end(); it++ )
-            if ((*it).getValue()==val)
-                count++;
-        return count;
-    }
-   
-
-    NormalizationRuleList::NormalizationRuleList(const std::vector<NormalizationRule> &normRuleList,bool strictNormalization ) : strictNormalization_m( strictNormalization )
-    {
-
-        assert (NormalizationValue::infinity!=NormalizationValue::one && 
-                NormalizationValue::infinity!=NormalizationValue::zero &&
-                NormalizationValue::zero!=NormalizationValue::one);
-
-       // assert( 1 >= std::count_if ( normRuleList.begin(), normRuleList.end(),    boost::bind(&NormalizationRule::getValue(),_1)(boost::lambda::_1) == NormalizationValue::infinity  ));
-       // assert( 1 >= std::count_if ( normRuleList.begin(), normRuleList.end(),    boost::bind(&NormalizationRule::getValue(),_1)(boost::lambda::_1) == NormalizationValue::zero  ));
-       // assert( 1 >= std::count_if ( normRuleList.begin(), normRuleList.end(),    boost::bind(&NormalizationRule::getValue(),_1)(boost::lambda::_1) == NormalizationValue::one  ));
-
-        assert( NormalizationRuleList::countValue(normRuleList,NormalizationValue::infinity )==1);
-        assert( NormalizationRuleList::countValue(normRuleList,NormalizationValue::zero )==1 );
-        assert( NormalizationRuleList::countValue(normRuleList,NormalizationValue::one )==1 );
-
-        std::vector<NormalizationRule> normRuleListCopy= normRuleList;
-
-        std::vector<NormalizationRule> normRuleListTmp;
-        assert (normRuleList_m.size() <=3 );
-
-        for ( size_t pos = 0;pos < normRuleListCopy.size() ;pos++)
-        {
-            if (normRuleListCopy[pos].getPolynomialId()>=0 &&normRuleListCopy[pos].getExponent() >0)
-                normRuleList_m.push_back(normRuleListCopy[pos]);
-            else
-                normRuleListTmp.push_back(normRuleListCopy[pos]);
-        }
-        normRuleListCopy = normRuleListTmp;
-        //normRuleListTmp.resize(0);
-        normRuleListTmp.clear();
-         
-        for ( size_t pos = 0;pos < normRuleListCopy.size() ;pos++)
-        {
-            if (normRuleListCopy[pos].getPolynomialId()>=0 )
-                normRuleList_m.push_back(normRuleListCopy[pos]);
-            else
-                normRuleListTmp.push_back(normRuleListCopy[pos]);
-        }
-        normRuleListCopy = normRuleListTmp;
-        //normRuleListTmp.resize(0);
-        normRuleListTmp.clear();
-        
-        for ( size_t pos = 0;pos < normRuleListCopy.size() ; pos++ )
-        {
-            if (normRuleListCopy[pos].getExponent() >=0 )
-                normRuleList_m.push_back(normRuleListCopy[pos]);
-            else
-                normRuleListTmp.push_back(normRuleListCopy[pos]);
-        }
-
-            normRuleListCopy = normRuleListTmp;
-         //normRuleListTmp.resize(0);
-        normRuleListTmp.clear();
-        
-        for ( size_t pos = 0;pos < normRuleListCopy.size() ;pos++)
-        {
-                normRuleList_m.push_back( normRuleListCopy[pos] );
-        }
-        // check NormalizationValue
-    }
-
-    /// todo: es gibt zwei sorten von normalisierungsregeln:
-    /// 1. bei der Polynomsuche und zweitens bei der Anwendung!
-    NormalizationRuleList NormalizationRuleList::constructDefault(const ShapeList & shapelist)
-    {
-        int polynomialId = NormalizationRule::dontcare;  
-        int exponent = NormalizationRule::dontcare;  
-        //NormalizationValue value;
-        //NormalizationRule   first( polynomialId  = NormalizationRule::dontcare, exponent = NormalizationRule::dontcare,   value = NormalizationValue::infinity);
-        NormalizationRule   first( polynomialId  = 0, exponent = NormalizationRule::dontcare,    NormalizationValue::infinity);
-        NormalizationRule   second( polynomialId = 1, exponent = NormalizationRule::dontcare,    NormalizationValue::zero);
-        NormalizationRule   third( polynomialId  = NormalizationRule::dontcare, exponent = NormalizationRule::dontcare,   NormalizationValue::one);
-        std::vector<NormalizationRule> normRuleList;
-        normRuleList.push_back(first);
-        normRuleList.push_back(second);
-        normRuleList.push_back(third);
-        assert(normRuleList.size()==3);
-        return NormalizationRuleList(normRuleList);
-    }
-
-          
-                
-};
-    
diff --git a/sandbox/hurwitz.kroeker/src/NormalizationRules.h b/sandbox/hurwitz.kroeker/src/NormalizationRules.h
deleted file mode 100644
index 16a1712..0000000
--- a/sandbox/hurwitz.kroeker/src/NormalizationRules.h
+++ /dev/null
@@ -1,170 +0,0 @@
-#pragma once
-
-#include "Shape.h"
-#include <iostream>
-
-namespace RationalMapSearch
-{
-    /*enum class NormalizationValue
-        {   
-            infinity=-1,
-            zero = 0,
-            one = 1
-        };
-    */
-
-    /// is an enum emulation; not completely error-prone but acceptable to provide backward compatibility instead of enums.
-   class NormalizationValue
-        {   
-           
-
-            private:
-                int enumVal_m;
-
-           
-             NormalizationValue(int val)
-            {
-                enumVal_m=val;
-            };
-
-            protected:
-                static NormalizationValue createInfinityValue()
-                {
-                    return NormalizationValue(-1);
-                }
-                static   NormalizationValue createZeroValue()
-                {
-                    return NormalizationValue(0);
-                }
-                static NormalizationValue createOneValue()
-                {
-                    return NormalizationValue(1);
-                }
-
-            public:
-                bool operator==(const NormalizationValue& value) const
-                {   
-                    return value.enumVal_m==enumVal_m;
-                }
-              bool operator!=(const NormalizationValue& value) const
-                {   
-                    return value.enumVal_m!=enumVal_m;
-                }
-
-                static const NormalizationValue infinity;
-                static const NormalizationValue zero;
-                static const NormalizationValue one;
-        };
-
-
-
-    /// potenzielle Probleme: Konvertierung von und zu Shape::ScalarType
-    class NormalizationRule
-    {
-        private:
-
-              int                   polynomialId_m ;
-              int     exponent_m;
-              NormalizationValue    value_m;
-            
-        
-            
-        public:
-    
-  
-            static const int dontcare ;
-
-            NormalizationValue getValue() const { return value_m; };
-
-            int     getPolynomialId()   const { return polynomialId_m; };
-            int     getExponent()       const    { return exponent_m; };
-
-            
-
-            /// which polynomial to normalize  can be chosen arbitrarily if polynomialId==-1, same holds for exponent.
-            NormalizationRule(  int polynomialId, 
-                                int exponent,
-                                NormalizationValue  value);
-
-        
-    
-            void checkNormalizationRule(const ShapeList& shapelist) const;
-
-            bool matches(const ShapeList& shapelist,int polynomialId ) const;
-
-            bool matches(const Shape& shape ) const;
-
-            bool matches(int polynomialId , int exponent ) const;
-
-
-            //void setPolynomialId(int polynomialId)  ;
-
-            void clearPolynomialId();
-            void clearExponent();
-
-        // to use std::vector:  
-            //This means I must define a operator= with unclear semantics just because it is never used. Oh my noodles! 
-            // see for reference http://blog.copton.net/archives/2007/10/13/stdvector/index.html
-          /*  NormalizationRule& operator=(const NormalizationRule& rhs) { 
-                std::cerr<< "abort in NormalizationRule" << std::endl;
-                abort();
-                return *this;
-            }*/
-
-    };
-
-   
-
-
-    class NormalizationRuleList
-    {
-        private:
-            std::vector<NormalizationRule> normRuleList_m;
-            bool strictNormalization_m;
-
-        public:
-
-            static int countValue(const std::vector<NormalizationRule>& nrl, NormalizationValue val) ;
-            ///@optional jede mögliche Normalisierung probieren, so dass möglichst viele angewandt werden können.
-
-            NormalizationRuleList(const std::vector<NormalizationRule> &normRuleList, bool strictNormalization=false ) ;
-
-            //containsMatchingRules
-
-            static NormalizationRuleList constructDefault(const ShapeList & shapelist);
-
-            std::vector<NormalizationRule>  getNormalizationRuleListAsVector()  const {   return normRuleList_m;  }
-
-                bool strictNormalization()     const     {  return strictNormalization_m;   };
-
-            NormalizationRule operator [](size_t pos)
-            {
-                //assert( pos<normRuleList_m.size() );
-                return normRuleList_m.at(pos);
-            }
-
-            NormalizationRule getRuleByPolynomialId(int polynomialId)
-            {
-                for (size_t pos=0; pos< normRuleList_m.size(); pos++)
-                {   
-                    if (normRuleList_m[pos].getPolynomialId()==polynomialId)            
-                        return normRuleList_m[pos];
-                }
-                assert (false);
-            }
-
-            NormalizationRule getRuleByNormValue(NormalizationValue val)
-            {   
-                for (size_t pos=0; pos< normRuleList_m.size(); pos++)
-                {   
-                    if (normRuleList_m[pos].getValue()==val)            
-                        return normRuleList_m[pos];
-                }
-                assert (false);
-            }
-
-            size_t size() const { return normRuleList_m.size(); }
-    };
-
-};
-    
\ No newline at end of file
diff --git a/sandbox/hurwitz.kroeker/src/OutputMode.cpp b/sandbox/hurwitz.kroeker/src/OutputMode.cpp
deleted file mode 100644
index be47ebd..0000000
--- a/sandbox/hurwitz.kroeker/src/OutputMode.cpp
+++ /dev/null
@@ -1,12 +0,0 @@
-
-#include "OutputMode.h"
-
-namespace RationalMapSearch
-{
-
-        const OutputMode OutputMode::defaultOutput = OutputMode::getDefaultOutputMode();
-        const OutputMode OutputMode::GAPOutput= OutputMode::getGAPOutputMode(); 
-        const OutputMode OutputMode::M2Output=OutputMode::getM2OutputOutputMode();
-
-
-}
diff --git a/sandbox/hurwitz.kroeker/src/OutputMode.h b/sandbox/hurwitz.kroeker/src/OutputMode.h
deleted file mode 100644
index ec1da71..0000000
--- a/sandbox/hurwitz.kroeker/src/OutputMode.h
+++ /dev/null
@@ -1,71 +0,0 @@
-//
-// C++ Interface: OutputMode
-//
-// Description: 
-//
-//
-// Author: J. Kröker <kroeker@mathpc26>, (C) 2012
-//
-// Copyright: See COPYING file that comes with this distribution
-//
-//
-
-namespace RationalMapSearch
-{
-
-/// @note: typesafe enum needs c++0x compiling option!
-
-     /*
-        enum class OutputMode
-        {
-            GAPOutput,
-            M2Output,
-            defaultOutput
-        };
-    */
-
-        /// is an enum emulation; not completely error-prone but acceptable to provide backward compatibility instead of enums.
-    class OutputMode
-    {
-  
-    
-        private :
-
-            int enumVal_m;
-
-            OutputMode(int val)
-            {
-                enumVal_m=val;
-            }
-
-         protected:
-            
-            static OutputMode getDefaultOutputMode()
-            {
-                return OutputMode(1);
-            }
-
-            static OutputMode getGAPOutputMode()
-            {
-                return OutputMode(2);
-            }
-            static OutputMode getM2OutputOutputMode()
-            {
-                return OutputMode(3);
-            }
-       public :
-        static const OutputMode GAPOutput;
-        static const OutputMode M2Output;
-        static const OutputMode defaultOutput;
-  
-        bool operator==(const OutputMode & mode)  const     
-            {
-                return mode.enumVal_m==enumVal_m;
-            }
-            bool operator!=(const OutputMode & mode)  const   
-            {
-                return mode.enumVal_m!=enumVal_m;
-            }
-          
-    };
-}
diff --git a/sandbox/hurwitz.kroeker/src/PolSetOutputHandlers.h b/sandbox/hurwitz.kroeker/src/PolSetOutputHandlers.h
deleted file mode 100644
index 72fce60..0000000
--- a/sandbox/hurwitz.kroeker/src/PolSetOutputHandlers.h
+++ /dev/null
@@ -1,278 +0,0 @@
-
-#pragma once
-
-  
-#include "hmfTypedefs.h"
-#include "OutputMode.h"
-
-#include <iostream>
-#include <sstream>
-
-namespace RationalMapSearch
-{
-
-
-    template<class TPolRingTypePar>
-    class FiniteFieldSearch;
-
-
-    
-    // preconditions:   
-    //-   TPolRingTypePar::ElementType
-    //-   TPolRingTypePar::CoeffRingType
-    //-   TPolRingTypePar::CoeffRingType::operator[ exponent ]()
-    //-   TPolRingTypePar::CoeffRingType::ElementType
-    //-   TPolRingTypePar::CoeffRingType::getExactDegree()
-    //-   TPolRingTypePar::getCoeffRing()
-    //-   TPolRingTypePar::CoeffRingType::elemToGeneratorExponent()
-
-    template<class TPolSet>
-    class IOutputHandler
-    {
-        public:
-            virtual void startOutput( )=0;
-            virtual void finishOutput( )=0;
-            virtual void print(const TPolSet& polSet)=0;
-
-            virtual ~IOutputHandler() {};
-    };
-
-    template<class TPolSet>
-    class EmptyOutputHandler  : public IOutputHandler<TPolSet>
-    { 
-            public:
-        
-            EmptyOutputHandler( ) {};
-            virtual void startOutput( ) {};
-            virtual void finishOutput( ) {};
-            virtual void print(const TPolSet& polSet) 
-            {};
-            virtual ~EmptyOutputHandler() {};
-    };
-
-    template<class TPolSet>
-    class GAPOutputHandler  : public IOutputHandler<TPolSet>
-    { 
-        private:
-            bool printFirst_m;
-        public:
-
- 
-
-            GAPOutputHandler():printFirst_m(true)
-            {}
-        
-      
-            std::ostream & start( std::ostream & os)
-            {   
-                  os << " [ " ;
-                  return os;
-            }
-
-            std::ostream & finish( std::ostream & os)
-            {   
-                  os << " ] ;" << std::endl;
-                  return os;
-            }
-
-            virtual void startOutput( )
-            {   
-                start(std::cout);
-            }
-            virtual void finishOutput( )
-            {   
-                finish(std::cout);
-            }
-
-
-            std::ostream &  printPolynomial(std::ostream &os, const typename TPolSet::PolynomialRingType &  polRing, 
-                                                              const typename TPolSet::ElementType   &  pol, 
-                                                              int maxDegree)
-            {
-
-                typedef typename TPolSet::PolynomialRingType::CoeffRingType::ElementType    CoeffType;
-                  int degree = pol.getExactDegree();
-                 assert(degree>=0);
-                 bool first=true;
-                os << " [ " ;
-                int currDegree=0;
-                 for (  currDegree=0 ; currDegree<=degree; currDegree++)
-                {
-                    if (! first)
-                                        os << ", " ;
-                    first = false;
-                    {
-                        CoeffType coeff = pol[ currDegree ] ;
-                         if (coeff.isZero() )
-                              os <<   " 0*Z(" <<  polRing.getCoeffRing().getCardinality() << ") " ;
-                        else
-                        {
-                            std::stringstream oss;
-                        
-                            int exponent =    (polRing.getCoeffRing() ).elemToGeneratorExponent(coeff);
-                             oss << exponent    ;
-                        
-                              os <<  "  Z(" <<  (polRing.getCoeffRing().getCardinality()) << ")^" << oss.str() << " ";   
-                        }
-                    }
-                }
-                for (    ; currDegree<=maxDegree; currDegree++)
-                { 
-                    if (! first)
-                        os << ", " ;
-                    first = false;
-                    os <<   " 0*Z(" <<  polRing.getCoeffRing().getCardinality() << ") " ;
-                }
-                os << " ] " << std::endl;
-                return os;
-            }
-            
-    protected:
-           std::ostream & iprint( std::ostream &os, const TPolSet & polSet )
-           {
-               
-                if (! printFirst_m)
-                {
-                    os << " , " ;
-                }
-                os << " [ " ;
-            
-                bool firstPolynomial=true;
-
-                TPolSet  polSetCopy = polSet;
-
-                typename TPolSet::ElementType pol = polSet[0];
-                
- 
-                for (size_t pos=0; pos< polSetCopy.size(); pos++)
-                {
-                    if (! firstPolynomial)    os << " , " ;
-
-                    firstPolynomial=false;
-                    // print polynomial in some style, dependent on the polynomial.
-                    printPolynomial(os, polSet.getRing() , polSetCopy[pos], polSet.getDegree() );
-                }
-                os << " ] " ;
-
-                printFirst_m = false;               
-                return os;
-           }
-
-        public :
-           virtual void print( const   TPolSet&   polSet  )
-           {
-                {
-                  iprint(std::cout,  polSet );
-                }
-           }
-            virtual ~GAPOutputHandler() {};
-    };
-  template<class TPolSet>
-    class M2OutputHandler  : public IOutputHandler<TPolSet>
-    { 
-        private:
-            bool printFirst_m;
-        public:
-
- 
-
-            M2OutputHandler():printFirst_m(true)
-            {}
-        
-      
-            std::ostream & start( std::ostream & os)
-            {   
-                  os << " { " ;
-                  return os;
-            }
-
-            std::ostream & finish( std::ostream & os)
-            {   
-                  os << " } ;" << std::endl;
-                  return os;
-            }
-
-            virtual void startOutput( )
-            {   
-                start(std::cout);
-            }
-            virtual void finishOutput( )
-            {   
-                finish(std::cout);
-            }
-
-        
-            std::ostream &  printPolynomial(std::ostream &os, const typename TPolSet::PolynomialRingType &  polRing, 
-                                                              const typename TPolSet::ElementType   &  pol, 
-                                                              int maxDegree)
-            {
-
-                typedef typename TPolSet::PolynomialRingType::CoeffRingType::ElementType    CoeffType;
-                int i;
-            
-                CoeffType    z;
-            
-                bool first = true;
-            
-                for (i=0; i<= pol.getExactDegree() ; i++)
-                {
-                    
-                    z = pol.getCoeff(i); 
-                    if ( z.isNotZero() )
-                    {
-                        if (first)
-                            first=false;
-                        else
-                        {
-                            os << " + ";
-                        }
-                            
-                        os << "(" << z << ")*x^" << i ;
-                    }
-                }
-                return os;
-            }
-            
-    protected:
-           std::ostream & iprint( std::ostream &os, const TPolSet & polSet )
-           {
-               
-                if (! printFirst_m)
-                {
-                    os << " , " ;
-                }
-                os << " { " ;
-            
-                bool firstPolynomial=true;
-
-                TPolSet  polSetCopy = polSet;
-
-                typename TPolSet::ElementType pol = polSet[0];
-                
- 
-                for (size_t pos=0; pos< polSetCopy.size(); pos++)
-                {
-                    if (! firstPolynomial)    os << " , " ;
-
-                    firstPolynomial=false;
-                    // print polynomial in some style, dependent on the polynomial.
-                    printPolynomial(os, polSet.getRing() , polSetCopy[pos], polSet.getDegree() );
-                }
-                os << " } " ;
-
-                printFirst_m = false;               
-                return os;
-           }
-
-        public :
-           virtual void print( const   TPolSet&   polSet  )
-           {
-                {
-                  iprint(std::cout,  polSet );
-                }
-           }
-            virtual ~M2OutputHandler() {};
-    };
-
-
-}
diff --git a/sandbox/hurwitz.kroeker/src/PolynomialShape.h b/sandbox/hurwitz.kroeker/src/PolynomialShape.h
deleted file mode 100644
index 80cd027..0000000
--- a/sandbox/hurwitz.kroeker/src/PolynomialShape.h
+++ /dev/null
@@ -1,163 +0,0 @@
-#pragma once
-
-#include <vector>
-#include "FactorPolynomialWrapper.h"
-
-// ShapeRepType expected as  ' vector<INTType> '. Improvement:: could accept a bidirectional iterator.
-template<typename ShapeRepType>
-inline ShapeRepType    dualPartition(const ShapeRepType dualmulstruct  )
-{
-    int max=0;
-    ShapeRepType    multiplicityStructure(max,0);
-
-    // max =* ( std::max_element( dualmulstruct.begin(), dualmulstruct.end() ) );
-    for (int pos= dualmulstruct.size()-1; pos >=0; pos--)
-    {
-        if (dualmulstruct[pos]>max)
-            max=dualmulstruct[pos];
-    }
-
-
-    if (dualmulstruct.size()>0)
-    {
-        multiplicityStructure.resize(max);
-
-        for (int i=0; i<max; i++)
-        {
-            
-            for (int pos= dualmulstruct.size()-1; pos >=0; pos--)
-            {
-                if ( dualmulstruct[ pos ] > i )
-                    multiplicityStructure[ i ] ++;
-            }
-            
-            
-        }
-    }   
-    return  multiplicityStructure;
-}
-
-/*
-internalPolynomialMatchesShape (Shape,RingElement,RingElement) := (shape, univarPoly, variable ) -> (
-    assert( #(degree univarPoly) == 1); -- otherwise we have a multigraded ring.
-    assert( ring univarPoly === ring variable );
-    dualMulStructSize := #(shape#"dual");
-    gcdF := univarPoly;
-    dF := univarPoly;
-    pos := 0; -- position in 'shape#"dual"'  array
-    --
-    -- the while loop is used instead of apply because it is not possible to return from an apply loop
-    while (gcdF != 1_(ring variable) and dF != 0_(ring variable)) do (
-        prevDegree := degree(variable, gcdF);
-        dF = diff( variable, dF );
-        gcdF =  gcd( gcdF, dF );
-        referenceDegreeDifference := 0;
-        if ( pos < dualMulStructSize) then 
-            referenceDegreeDifference = (shape#"dual")_pos;
-        if  (prevDegree - degree(variable, gcdF) != referenceDegreeDifference)    then 
-            return false;
-        pos = pos+1;
-    );
-    -- if (pos >= dualMulStructSize) then the multiplicity structure was fulfilled:
-    return (pos >= dualMulStructSize );
-)
-
-*/
-
-/// @todo multiplicityStructure as object
-template <class TPolynomialRing, typename Shape>
-inline  bool        polynomialMatchesShapeStrict(const typename TPolynomialRing::Element     & poly, 
-                                    const TPolynomialRing & polynomialRing, const Shape & required_shape)
-{
-     Shape shape = RationalMapSearch::FLINTFactorPolynomial::computeShape<TPolynomialRing>(poly,polynomialRing);
-    
-     return ( shape.getShapeRep() == required_shape.getShapeRep() );
-}
-
-
-/// @todo multiplicityStructure as object
-template <class TPolynomialRing, typename Shape>
-inline  bool        polynomialMatchesShape(const typename TPolynomialRing::Element     & poly, 
-                                    const TPolynomialRing & polynomialRing, const Shape & shape)
-{
-
-    typedef typename TPolynomialRing::Element       TPolynomial;
-
-    TPolynomial gcdf( poly);
-    
-    //TPolynomial dF = polynomialRing.diff( gcdf );    
-    TPolynomial dF(poly);
-
-    int prevDegree, referenceDegreeDifference;
-    size_t pos=0;
-
-    typename Shape::ShapeRepType  dualShapeRep =  shape.getDualShapeRep();
-    
-    while (! gcdf.isConstant() && !(dF.isZero())  )
-    {
-        prevDegree = gcdf.getExactDegree();
-        //gcdf = polynomialRing.gcd(gcdf,dF);
-        dF = polynomialRing.diff( dF );
-        gcdf = polynomialRing.fastgcd(gcdf,dF);
-        referenceDegreeDifference = 0;
-        
-        if ( pos < dualShapeRep.size() )   
-            referenceDegreeDifference = dualShapeRep[pos];
-        if  ( ( prevDegree - gcdf.getExactDegree()) != referenceDegreeDifference )
-            return false;
-        pos = pos+1;
-    }
-     return (pos >= dualShapeRep.size() );
-}
-
-
-/// @todo multiplizitätsstruktur wird manchmal immer noch nicht korrekt berechbet ->
-/// @todo multiplicityStructure as object
-template <class TPolynomialRing, typename ShapeRepType>
-inline  ShapeRepType        computeMultiplicityStructureStrict(const typename TPolynomialRing::Element     & poly, 
-                                    const TPolynomialRing & polynomialRing)
-{
-
-   //factoring is c.a 4 times slower and maybe incorrect
-    return RationalMapSearch::FLINTFactorPolynomial::computeShape<TPolynomialRing>(poly,polynomialRing);
-}
-
-
-/// @todo multiplizitätsstruktur wird manchmal immer noch nicht korrekt berechbet ->
-/// @todo multiplicityStructure as object
-template <class TPolynomialRing, typename ShapeRepType>
-inline  ShapeRepType        computeMultiplicityStructure(const typename TPolynomialRing::Element     & poly, 
-                                    const TPolynomialRing & polynomialRing)
-{
-
-    typedef typename TPolynomialRing::Element       TPolynomial;
-     
-    ShapeRepType    degrees;
-
-    if ( poly.isConstant() )
-        return degrees;
-
-    TPolynomial gcdf( poly);
-    
-    TPolynomial dF= polynomialRing.diff( gcdf );    
-
-    degrees.push_back( gcdf.getExactDegree() );
-    
-    while (! gcdf.isConstant() && !(dF.isZero())  )
-    {
-        //gcdf = polynomialRing.gcd(gcdf,dF);
-        gcdf = polynomialRing.fastgcd(gcdf,dF);
-        degrees.push_back(gcdf.getExactDegree() );
-        dF = polynomialRing.diff( dF );
-    }
-
-    ShapeRepType    dualMultiplicityStructure;
-    dualMultiplicityStructure.resize( degrees.size()-1  ,0);
-
-    for (int pos= degrees.size()-2; pos>=0; pos--)
-    {
-        dualMultiplicityStructure[pos]= degrees[pos]- degrees[pos+1]  ;
-    }
-
-    return dualPartition( dualMultiplicityStructure );
-}
diff --git a/sandbox/hurwitz.kroeker/src/Shape.cpp b/sandbox/hurwitz.kroeker/src/Shape.cpp
deleted file mode 100644
index 356a7eb..0000000
--- a/sandbox/hurwitz.kroeker/src/Shape.cpp
+++ /dev/null
@@ -1,474 +0,0 @@
-
-
-
-#include <assert.h>
-#include <cstdio>
-#include <iostream>
-#include <functional>
-#include <numeric>
-#include <algorithm>
-#include <sstream>
-
-/*#include <boost/function.hpp>
-#include <boost/lambda/lambda.hpp>
-#include <boost/foreach.hpp>
-#include <boost/bind.hpp> 
-#include <boost/lambda/if.hpp>
-*/
-
-//using namespace boost;
-//using namespace boost::lambda;
-
- 
-
-
-#include "Shape.h"
-
-
-namespace RationalMapSearch
-{
-
-
-     std::ostream &  operator<<(std::ostream & out, const PolynomialFactorBluePrint& bp)
-     {
-            out << "( [" << bp.polynomialId_m << "] : " << bp.degree_m << "^" << bp.multiplicity_m << ")" ;
-            return out;
-     }
-
-     std::ostream &  operator<<(std::ostream & out, const Shape& shape)
-     {
-            out << "( ";
-            for (size_t i=0; i<shape.size(); i++)
-                out << shape[i] << " " ;
-            out << " ) ";
-            return out;
-     }
-
-    // todo: test, ob es mit liste und vector ok ist.
-     Shape::Shape( const    Shape& shape ) :  shape_m ( shape.shape_m ) , 
-                                                    dual_m  ( shape.dual_m  ) , 
-                                                    degree_m( shape.degree_m),
-                                                    multiplicityDegreeMap_m( shape.multiplicityDegreeMap_m )
-    {
-    }
-
-
-    Shape::Shape( const    ShapeRepType& vec ) :  shape_m( initShapeRep(vec) ),
-                                                    dual_m( conjugate(vec) ),
-                                                    degree_m ( std::accumulate( vec.begin(), vec.end(), 0 )),
-                                                    multiplicityDegreeMap_m( createMultiplicityDegreeRep(vec) )
-    {
-             
-    }
-
-    
-    
-
-    // todo: hast vergessen, dass wenn ein shape nur unendlich hat, nix mehr übrig bleibt.
-    Shape::ShapeRepType Shape::conjugate(const    ShapeRepType& vec)
-    {
-       
-        ShapeRepType sortedVec = vec; 
-        std::sort( sortedVec.begin(), sortedVec.end(), std::greater<int>() );
-
-        // Macaulay2: dualPartition = L -> apply(max L, i-> #(select(L,j->j>i)))
-
-
-        ScalarType max= 0;
-        if ( sortedVec.size()>0 )
-            max = sortedVec[0];
-
-        ShapeRepType conjugateVec( max );
-        for (int pos=0; pos<max ; pos++)
-        {   
-            //boost::function<bool(ScalarType)> f = ( boost::lambda::_1 > pos );
-            //// sortedVec[pos] = (ScalarType) count_if ( sortedVec.begin(), sortedVec.end(), [](ScalarType x) { return x > pos; });
-            //// conjugateVec[pos] = (ScalarType)  std::count_if ( sortedVec.begin(), sortedVec.end(), f );
-            //conjugateVec[pos] = (ScalarType)  std::count_if ( sortedVec.begin(), sortedVec.end(),  boost::lambda::_1 > pos  );
-            int counter=0;
-            for  (ShapeRepType::const_iterator it= sortedVec.begin(); it!= sortedVec.end(); it++)
-            {
-                if  ((*it)>pos )
-                    counter++;
-            }
-            conjugateVec[pos] = counter;
-        }
-        return conjugateVec;
-    }
-
-    bool  Shape::hasExponent(ScalarType   exp) const
-    {
-        for (size_t pos =0;pos!=shape_m.size();pos++)
-        {
-            if (  shape_m[pos] == exp  )
-                return true;
-        }
-        return false;
-    }
-
-    //removes given exponent from the Shape, if possible and returns the result as new shape.
-    Shape   Shape::removeExponent(ScalarType   exp) const
-    {
-        if ( ! hasExponent(exp))
-            return Shape(*this);
-        
-        bool first=true;
-       //  boost::function<bool(ScalarType)> expMatches = (boost::lambda::if_then_else_return ((_1==exp && first), !first=false,  false ));
-       // boost::remove_copy_if (shape_m.begin(),shape_m.end(),result,expMatches);
-        
-        ShapeRepType result;
-        for (size_t pos =0; pos!=shape_m.size(); pos++)
-        {
-            if (  shape_m[pos] == exp && first )
-            {
-                first=false;
-                continue;
-            }
-            result.push_back( shape_m[pos] );
-        }
-        return Shape(result);
-    }
-        
-    bool  Shape::operator==(const Shape &shape) const
-    {
-        return (shape.shape_m==this->shape_m);
-    }
-
-    Shape::ShapeRepType Shape::initShapeRep(const    ShapeRepType& vec)
-    {
-        ShapeRepType retval =vec; 
-        std::sort( retval.begin(),retval.end(), std::greater<int>() );
-        ShapeRepType::iterator it;
-        for (it= retval.begin(); it != retval.end();it++)
-        {
-            assert((*it)>0);
-        }
-        return retval;
-    }
-
-    Shape::MultiplicityDegreeHashType  Shape::createMultiplicityDegreeRep(const Shape::ShapeRepType &ShapeRepType) 
-    {
-        //std::vector<std::pair> result;
-    
-        Shape::MultiplicityDegreeHashType multiplicityDegreeMap;
-
-        for ( size_t pos =0; pos!=ShapeRepType.size(); pos++)
-        {
-
-            if ( multiplicityDegreeMap.find( ShapeRepType[pos] ) == multiplicityDegreeMap.end() )
-                multiplicityDegreeMap.insert(std::pair< MultiplicityDegreeRepKey, MultiplicityDegreeRepValue > (ShapeRepType[pos],1) );
-            else 
-                multiplicityDegreeMap[ ShapeRepType[pos] ]++;
-        }
-
-        return multiplicityDegreeMap;
-    }
-
-    bool    Shape::hasNaturalNormalizableFactor() const
-    {
-        Shape::MultiplicityDegreeHashType::const_iterator it;
-        for ( it = multiplicityDegreeMap_m.begin(); it != multiplicityDegreeMap_m.end(); it++ )
-        {   
-                if ((*it).second==1)
-                    return true;
-        }
-        return false;
-    }
-
-    // Todo: move computation to constructor and a member variable? 
-    Shape::ScalarType   Shape::getMaxFactorDegree() const
-    {
-        Shape::MultiplicityDegreeHashType::const_iterator it;
-        Shape::ScalarType maxFactorDegree = 1;
-        for ( it = multiplicityDegreeMap_m.begin(); it != multiplicityDegreeMap_m.end(); it++ )
-        {   
-                if ((*it).second>maxFactorDegree)
-                    maxFactorDegree=(*it).second;
-        }
-        return maxFactorDegree;
-    }
-
-    std::string     Shape::toString()   const
-    {
-        std::stringstream strstr;
-        
-        strstr << "{ " ;
-        for (size_t pos=0; pos <shape_m.size(); pos++)
-        {
-            if (pos>0 )
-                strstr << ", " ;
-            strstr << shape_m[pos];
-        }
-        strstr << "} " ;
-        return strstr.str();
-    }
-
-    void Shape::test()
-    {
-   
-        // removed initializer list usage for backward compatibility
-        //        std::vector< Shape::ScalarType >    partition = { 4,3,2,2,2 };
-
-        // std::vector< Shape::ScalarType >    dualPartition =  { 5,5,2,1 };
-
-        int ar[]={ 4,3,2,2,2 };
-        const int TotalItems = sizeof(ar)/sizeof(ar[0]);
-        std::vector< Shape::ScalarType >    partition(ar, ar+TotalItems);
-
-        int dar[]= { 5,5,2,1 };
-        const int TotalItemsDar = sizeof(dar)/sizeof(dar[0]);
-        std::vector< Shape::ScalarType >    dualPartition(dar, dar+TotalItemsDar);
-
-        
-        Shape shape(partition);
-        Shape::ShapeRepType dual = shape.getDualShapeRep();
-        Shape::ShapeRepType storedPartition = shape.getShapeRep();
-
-        assert(shape.hasNaturalNormalizableFactor() );
-        assert(shape.conjugate(shape.conjugate(storedPartition))==storedPartition);
-
-        // copy(dual.begin(), dual.end(), std::ostream_iterator<Shape::ScalarType>(std::cout, "\n"));
-        assert( dualPartition==dual );
-        assert( partition == storedPartition );
-        assert( shape.getDegree()==13 );
-        assert( shape.getMaxFactorDegree()==3 );
-
-        Shape reducedShape = shape.removeExponent(2);
-
-        //Shape refReducedShape = { 4,3,2,2 };
-
-        int  redar[]={ 4,3,2,2 };
-        const int TotalItemsRed = sizeof(redar)/sizeof(redar[0]);
-        std::vector< Shape::ScalarType >    preRefReducedShape(redar, redar+TotalItemsRed);
-        Shape refReducedShape(preRefReducedShape);
-
-        assert( refReducedShape==refReducedShape );      
-
-        //Shape shapeN = { 4,4,3,3,2,2,2 };
-
-        int  Nar[]={ 4,3,2,2 };
-        const int TotalItemsNar = sizeof(Nar)/sizeof(Nar[0]);
-        std::vector< Shape::ScalarType >    preShapeN(Nar, Nar+TotalItemsNar);
-        Shape shapeN(preShapeN);
-
-        assert(! shapeN.hasNaturalNormalizableFactor() );
-
-        MultiplicityDegreeHashType::const_iterator it;
-
-        assert(shapeN.multiplicityDegreeMap_m[4]==2);
-        assert(shapeN.multiplicityDegreeMap_m[3]==2);
-        assert(shapeN.multiplicityDegreeMap_m[2]==3);
-
-        for (it=shapeN.multiplicityDegreeMap_m.begin();it!=shapeN.multiplicityDegreeMap_m.end();it++)
-        {
-            std::cerr << (*it).first << "^" << (*it).second << std::endl;
-        }
-        std::cerr << "Shape test succeeded!\n";
-    }
-
-
-    ShapeList::ShapeList( const  std::vector<Shape> shapeList )    : shapeList_m(shapeList), reordered_m(false)
-    {
-        checkConsistency();   
-    }
-    ShapeList::ShapeList( const ShapeList& shapeList): shapeList_m(shapeList.shapeList_m),
-                                                                reordered_m(shapeList.reordered_m)
-    {   
-       checkConsistency();
-    } 
-
-    ShapeList   ShapeList::removeExponent( unsigned int polynomId, ScalarType   exp) const
-    {
-            assert( size()>polynomId ) ;
-            ShapeList slcopy = *this;
-            slcopy.shapeList_m[polynomId] = slcopy.shapeList_m[polynomId].removeExponent(exp);
-            return slcopy;
-    }
-
-    void ShapeList::checkConsistency() const
-    {
-        assert( shapeList_m.size()>1 );
-        if (reordered_m) 
-        {
-            assert(reorderMap_m.size()==shapeList_m.size() );
-            for (size_t pos=0;pos<reorderMap_m.size(); pos++)
-            {   
-                assert(1==(int) count ( reorderMap_m.begin() , reorderMap_m.end(), pos ));
-            }
-        }
-
-        size_t polDegree = shapeList_m[0].getDegree();
-
-        for (ShapeListRepType::const_iterator it=shapeList_m.begin(); it!=shapeList_m.end(); it++)
-        {
-            assert( (*it).getDegree() == polDegree );
-        }
-        /*BOOST_FOREACH( Shape shape, shapeList_m )
-        {
-            assert( shape.getDegree() == polDegree );
-        }*/
-        //boost::function<void(Shape)>  checkDegree = ( assert( (boost::bind( &Shape::getDegree,boost::lambda::_1) ==polDegree ))() ) ;
-        //std::for_each(shapeList_m.begin(),shapeList_m.end(),checkDegree  );
-        //std::for_each(shapeList_m.begin(),shapeList_m.end(), boost::bind( &Shape::getDegree,boost::lambda::_1) ==polDegree  );
-    
-    }
-
-     //       ShapeList( const ShapeList&,  std::vector<size_t> reorderMap );
-
-    ShapeList::ScalarType  ShapeList::getMaxFactorDegree( ) const
-    {
-        ShapeList::ScalarType maxFactorDegree = 1;
-       
-      /* BOOST_FOREACH( Shape shape, shapeList_m )
-        {
-            ShapeList::ScalarType tmpFactor = shape.getMaxFactorDegree();
-            if ( tmpFactor >maxFactorDegree)
-                maxFactorDegree = tmpFactor;
-        }*/
-
-         for (ShapeListRepType::const_iterator it=shapeList_m.begin(); it!=shapeList_m.end(); it++)
-        {
-              ShapeList::ScalarType tmpFactor = (*it).getMaxFactorDegree();
-                if ( tmpFactor >maxFactorDegree)
-                     maxFactorDegree = tmpFactor;
-        }
-
-        return maxFactorDegree;
-    }
-
-    
-    ShapeList::ScalarType  ShapeList::getConstructionMaxFactorDegree( ) const
-    {
-        
-        ShapeList::ScalarType maxFactorDegree = 1;
-                
-        if (  shapeList_m[0].getMaxFactorDegree()>maxFactorDegree)
-                maxFactorDegree = shapeList_m[0].getMaxFactorDegree();
-        if (  shapeList_m[1].getMaxFactorDegree()>maxFactorDegree)
-                maxFactorDegree = shapeList_m[1].getMaxFactorDegree();
-        
-        return maxFactorDegree;
-    }
-
-    /// @TODO BUG! - what does mean BUG, and why the hell maxDegree was initially = 2 ?
-    ShapeList::ScalarType  ShapeList::getDegree( ) const
-    {
-        int maxDegree = 1;
-       
-        /* BOOST_FOREACH( Shape shape, shapeList_m )
-        {
-            if (shape.getDegree()>maxDegree) 
-                maxDegree = shape.getDegree()  ;
-        }
-        */
-
-        for (ShapeListRepType::const_iterator it=shapeList_m.begin(); it!=shapeList_m.end(); it++)
-        {
-            if ((*it).getDegree()>maxDegree) 
-                maxDegree = (*it).getDegree()  ;
-        }
-
-        return maxDegree;
-    }
-
-    /// lower characteristic bound for 'polynomialMatchesShape'-check
-    /// @todo: need to prove correctness - not correct (bound too low) because all critival values obviously also have to be distinct, 
-    /// and  also  factors where there are no other factors in the same polynomial with same multiplicity ( they also have to be distinct ).
-    ///  minCharacteristic is  Max(computeLowerCharacBound, #cv, #factors where there are no other factors in the same polynomial with same multiplicity)
-    /// of course, then lowerCharBound will still not be fully correct, but much more accurate. 
-    /// 
-    /// @note first two shapes are leaved out, because they are constructed correct a priori by the search algorithm.
-    /// @note the function really depends on search algorithm and multiplicity check ('polynomialMatchesShape') implementations.
-    
-    ShapeList::ScalarType  ShapeList::computeLowerCharacBound( ) const
-    {   
-        ScalarType lowerCharBound = 2;
-        
-        // for each requires gcc 4.6
-        //for (Shape shape : shapeList_m)
-    
-        //    BOOST_FOREACH( Shape shape, shapeList_m )
-        for (size_t pos=2;pos< shapeList_m.size(); pos++)
-        {
-            if (shapeList_m[pos].getMaxExponent()>lowerCharBound-1) 
-                lowerCharBound = shapeList_m[pos].getMaxExponent() + 1;
-        }
-        return lowerCharBound;
-    }
-    
-    ShapeList::ScalarType  ShapeList::getMaxExponent() const
-    {
-        ScalarType maxExponent = 2;
-        /*BOOST_FOREACH( Shape shape, shapeList_m )
-        {
-            if (shape.getMaxExponent()>maxExponent) 
-                maxExponent = shape.getMaxExponent()  ;
-        }*/
-
-        for (ShapeListRepType::const_iterator it=shapeList_m.begin(); it!=shapeList_m.end(); it++)
-        {
-            if ((*it).getMaxExponent()>maxExponent) 
-                maxExponent = (*it).getMaxExponent()  ;
-        }
-
-        return maxExponent;
-    }
-    
-
-    const Shape&   ShapeList::operator[](size_t pos) const
-    {
-        if (reordered_m) 
-        {           
-            return  shapeList_m[reorderMap_m[pos]];
-        }
-        return shapeList_m[pos];
-    }
-
-    void ShapeList::test()
-    {   
-        //Shape shape = { 4,3,2,2,2 };
-
-        int ar[]={ 4,3,2,2,2 };
-        const int TotalItems = sizeof(ar)/sizeof(ar[0]);
-        std::vector< Shape::ScalarType >    partition(ar, ar+TotalItems);
-    
-        Shape shape(partition);
-        
-        std::vector< Shape >  preShapeList ( 3, shape );
-        
-        ShapeList   shapeList(preShapeList);
-        assert(shapeList.computeLowerCharacBound()>4);
-
-        std::cerr << "shapeList.getMaxFactorDegree()" << shapeList.getMaxFactorDegree()<<std::endl;
-        assert(shapeList.getMaxFactorDegree()==3);
-
-         Shape reducedShape= shapeList[0].removeExponent(2) ;
-
-        Shape reducedShape2 (reducedShape);
-
-        reducedShape2=reducedShape;
-
-        preShapeList.push_back(reducedShape );
-        //ShapeList   illegalShapeList(preShapeList);
-
-    }
-
-    
-    
-
-}
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
diff --git a/sandbox/hurwitz.kroeker/src/Shape.h b/sandbox/hurwitz.kroeker/src/Shape.h
deleted file mode 100644
index d5bea27..0000000
--- a/sandbox/hurwitz.kroeker/src/Shape.h
+++ /dev/null
@@ -1,268 +0,0 @@
-
-#pragma once
-
-#include <vector>
-#include <assert.h>
-#include <cstdlib>
-#include <map>
-#include <ext/hash_map> //TODO: replace with <unordered_map>!
-#include <hash_map>
-#include <iostream>
-#include <functional>
-#include <numeric>
-
-namespace RationalMapSearch
-{
-
-
-    struct PolynomialFactorBluePrint
-    {
-        uint multiplicity_m;
-        uint degree_m;   
-        uint polynomialId_m;   
-        PolynomialFactorBluePrint  (uint multiplicity, uint degree,uint polynomialId) : multiplicity_m(multiplicity), 
-                                                                                degree_m(degree),
-                                                                                polynomialId_m(polynomialId)
-        {};
-
-        PolynomialFactorBluePrint()
-        {
-            //assert(false);
-        }
-
-        static int  minDegreeMaxMultiplicityLower(const PolynomialFactorBluePrint &a, const PolynomialFactorBluePrint &b)
-        {
-            if ( a.degree_m != b.degree_m )
-                return ( a.multiplicity_m < b.multiplicity_m );
-            return ( a.degree_m < b.degree_m );
-        }
-    };
-
-    std::ostream &  operator<<(std::ostream & out, const PolynomialFactorBluePrint& bp);
-
-  
-
-    struct MultiplicityDegreePair
-    {
-        uint multiplicity_m;
-        uint degree_m;   
-
-        MultiplicityDegreePair  (uint multiplicity, uint degree) : multiplicity_m(multiplicity), degree_m(degree)
-        {};
-        
-    };
-
-    ///@note though it is possible to parametrize Shape with 
-
-    class Shape
-    {
-    
-        public:
-            typedef int ScalarType;
-
-      
-        typedef int32_t     MultiplicityDegreeRepKey;
-        typedef int32_t     MultiplicityDegreeRepValue;
-
-        typedef std::map< MultiplicityDegreeRepKey, MultiplicityDegreeRepValue >  MultiplicityDegreeHashType;
-        
-            typedef  std::vector< ScalarType > ShapeRepType;
-        
-        private:
-
-            // problem: can't be const when using assignment...
-            //const ShapeRepType    shape_m;
-            //const ShapeRepType    dual_m;
-
-          // problem: can't be const when using assignment...
-            ShapeRepType    shape_m;
-            ShapeRepType    dual_m;
-
-        
-            ScalarType  degree_m;
-        
-            MultiplicityDegreeHashType multiplicityDegreeMap_m;
-
-    
-        public:
-           
-          /*  outcommented initializer lists for backward compatibility
-             template <class E>
-            inline Shape(std::initializer_list<E> s);
-          */
-           
-
-           Shape ( const    Shape& shape );
-
-            Shape(const     ShapeRepType & vec);
-
-
-            // to use std::vector:  
-            //This means I must define a operator= with unclear semantics just because it is never used. Oh my noodles! 
-            // see for reference http://blog.copton.net/archives/2007/10/13/stdvector/index.html
-          /*  Shape& operator=(const Shape& rhs) { 
-                std::cerr<< "abort in shape";
-                abort();
-                return *this;
-            }*/
-
-    
-            // probably not this way, but additional class ShapeParser, which takes a string and returns a vector
-            // template TVec   Shape(const std::string     &   str);
-        
-            //todo: degree 
-            ScalarType  getDegree() const       {   return degree_m;    }        
-
-            
-            ShapeRepType    getShapeRep() const     {   return shape_m;    }      
-
-            ShapeRepType    getDualShapeRep() const {   return dual_m;    }
-
-            ScalarType  getMaxExponent() const  { assert(shape_m.size()>0);  return shape_m[0]; }
-
-    
-            /// todo: gibt es eigentlich eine Begründung für den DatentypWahl ScalarType für getMaxFactorDegree?
-            ScalarType  getMaxFactorDegree() const;
-            
-
-            const ScalarType&  operator[](size_t pos) const { assert(pos<shape_m.size() ); return shape_m[pos] ; }
-          
-            size_t      size()   const          { return shape_m.size();  };
-
-            
-           const  ShapeRepType &   getShapeRepRef() const     {   return shape_m;    }      
-
-            const ShapeRepType &   getDualShapeRepRef() const {   return dual_m;    }            
-
-            
-            Shape   removeExponent(ScalarType   exp) const;
-
-            bool   hasExponent(ScalarType   exp) const;
-            
-            static MultiplicityDegreeHashType  createMultiplicityDegreeRep(const     ShapeRepType & vec);
-
-            MultiplicityDegreeHashType  getMultiplicityDegreeRep() const  {return this->multiplicityDegreeMap_m;};
-
-            bool    hasNaturalNormalizableFactor() const;
-
-    
-            static ShapeRepType         conjugate(const    ShapeRepType& vec);
-
-            static ShapeRepType     initShapeRep(const    ShapeRepType& vec)  ; 
-
-            std::string         toString()  const;
-
-            static void test();
-
-            // sortExponentsByDegree      
-            
-            bool operator==(const Shape &shape) const;
-    };
-
-   /*  outcommented initializer lists for backward compatibility
-    template <class E>
-    inline Shape::Shape(std::initializer_list<E> s):                  shape_m (s.begin(),s.end()),
-                                    dual_m( conjugate(shape_m) ),
-                                                    degree_m ( std::accumulate( shape_m.begin(), shape_m.end(), 0 )),
-                                                    multiplicityDegreeMap_m( createMultiplicityDegreeRep(shape_m) )
-        {
-                
-                
-            }
-*/
-
-  std::ostream &  operator<<(std::ostream & out, const Shape& shape);
-
-    class ShapeList
-    {
-        public:
-           typedef  std::vector<Shape> ShapeListRepType;
-
-        private:
-         
-            ShapeListRepType  shapeList_m;
-         
-
-            std::vector<size_t>    reorderMap_m;
-            bool reordered_m;
-
-
-            void    checkConsistency() const;
-
-        public:
-            typedef Shape::ScalarType ScalarType;
-
-         
-            ShapeList   removeExponent( unsigned int polynomId, ScalarType   exp) const;
-    
-    
-            ShapeList( const  std::vector<Shape> shapeList );
-            ShapeList( const ShapeList& );
-            ShapeList( const ShapeList&,  std::vector<size_t> reorderMap );
-
-        /*     outcommented initializer lists for backward compatibility
-            template <class E>
-            inline ShapeList(std::initializer_list<E> s);
-
-           template <class E>
-            inline ShapeList(std::initializer_list<E> s1,std::initializer_list<E> s2,std::initializer_list<E> s3);
-
-
-            template <class E>
-            inline ShapeList(std::initializer_list< std::initializer_list<E> > s);
-
-            template <class E>
-            inline  ShapeList&  operator=(std::initializer_list<E> s);
-
-*/
-
-            ScalarType  getDegree( ) const;
-
-            ScalarType  getMaxFactorDegree( ) const;
-            ScalarType  getMaxExponent() const;
-
-            ScalarType  getCharLowerBound() const;
-            ScalarType  getConstructionMaxFactorDegree()    const;
-            ScalarType  computeLowerCharacBound( ) const;
-        
-            const Shape&   operator[](size_t pos) const;
-
-            size_t  size() const {  return shapeList_m.size();  }
-            
-            // reorderShapeList ()
-            // dropReordering()
-            // getReorderMap();
-            // std::vector<size_t> computeOptimalReorderingMap() const; // todo: introduce parameters ...
-            // findMinPenaltyShapePos
-    
-            static void test();
-    };
-
-/*  outcommented initializer lists for backward compatibility
-        template <class E>
-        inline  ShapeList::ShapeList(   std::initializer_list<E> s1,
-                                        std::initializer_list<E> s2,
-                                        std::initializer_list<E> s3)     :  shapeList_m ( {s1,s2,s3} ),  
-                                                                            reordered_m(false)
-
-        {
-            checkConsistency();
-        }
-        
-        template <class E>
-        inline ShapeList::ShapeList( std::initializer_list<E> s ):        shapeList_m (s.begin(),s.end()),  
-                                                                        reordered_m(false)
-        {
-            checkConsistency();
-        }
-
-        template <class E>
-        inline ShapeList::ShapeList( std::initializer_list< std::initializer_list<E> > s ):   shapeList_m (s.begin(),s.end()), 
-                                                                                            reordered_m(false)
-        {
-            checkConsistency();
-        }
-     */
-        
-}
-
diff --git a/sandbox/hurwitz.kroeker/src/basicNumber.cpp b/sandbox/hurwitz.kroeker/src/basicNumber.cpp
deleted file mode 100755
index a4814d8..0000000
--- a/sandbox/hurwitz.kroeker/src/basicNumber.cpp
+++ /dev/null
@@ -1,673 +0,0 @@
-
-
-
-
-//----------------------basicNumber----------------------------------------
-
-
-
-
-
-
-template <typename TScalar>
- const basicNumber<TScalar> basicNumber<TScalar>::Zero = basicNumber<TScalar>((TScalar)0);
-
-template <typename TScalar>
- const basicNumber<TScalar> basicNumber<TScalar>::One = basicNumber<TScalar>((TScalar)1);
-
-
-
-
-
-
-
-
-
-//-------------------------Constructors--------------------------------------------------------
-
-template <typename TScalar>
-inline   basicNumber<TScalar>::basicNumber()  : x(0), eps(0) {};
-
-
-/// constructs a basic number {s + 0*EPS }
-template <typename TScalar>
-inline basicNumber<TScalar>::basicNumber (TScalar s) : x(s), eps(0)	 {	 };
-
-
-/// constructs a basic number, epsPrecision is ignored and assumed =1
-template <typename TScalar>
-inline basicNumber<TScalar>::basicNumber (TScalar epsPrecision, std::string s ) :x(0), eps(0)
-{
-	if (epsPrecision>1)
-	{
- 		std::cerr << " allowed epsPrecision is { 0, 1 }" << std::endl;
-		throw(" allowed epsPrecision is { 0, 1 }");
-	}
-	//	assert(epsPrecision<2);
-};
-
-/// copy constructor
-template <typename TScalar>
-inline basicNumber<TScalar>::basicNumber (const  basicNumber<TScalar> & z) 	: x(z.x), eps(z.eps)	 {};
-
-
-	
-/// constructs a basic number {s + t*eps }
-template <typename TScalar>
-inline basicNumber<TScalar>::basicNumber (TScalar s, TScalar t) 	: x(s), eps(t)	 	 {};
-
-
-template <typename TScalar>
- inline bool  basicNumber<TScalar>::wellDefined(unsigned int characteristic)
-{
-	//std::cerr << "wellDefined: characteristic" << characteristic << std::endl;
-
-	assert(sizeof(long long)>sizeof(TScalar));	//otherwise the following test does not work
-
-	long long 	test  = pow( 2.0, (int)sizeof(TScalar)*8 )-1;
-	TScalar test2 = test;
-	test = test2;
-
-	if (test<0)
-	{
-		
-		//std::cerr << "TScalar is signed!" << std::endl;
-		assert(pow( 2.0, (int)sizeof(TScalar)*8-1 )>characteristic);
-	}
-	else
-	{
-		std::cerr << "warning: TScalar is unsigned!" << std::endl;
-		assert(pow( 2.0, (int)sizeof(TScalar)*8 )>characteristic);
-	}
-	return true;
-}
-
-
-
-
-//-------------------------Properties--------------------------------------------------------
-/// returns maximum possible epsPrecision (here: 1)
-template <typename TScalar>
-inline unsigned short basicNumber<TScalar>::getEpsPrecision() const
-{
-	return 1;
-}
-
-
-template <typename TScalar>
-inline short basicNumber<TScalar>::getEpsDegree() const
-{
-	if ( getEps() !=0 ) 
-		return 1;
-	else if ( getX() !=0 ) 
-		return 0;
-	else return -1;
-}
-
-//-----------------------------------data Access-------------------------------------------------------
-
-template <typename TScalar>
-inline   TScalar   basicNumber<TScalar>::getX() const 
-{
-	return x;
-}
-
-template <typename TScalar>
-inline  TScalar   basicNumber<TScalar>::getEps() const
-{
-	return (eps);
-}
-
-template <typename TScalar>
-inline TScalar& basicNumber<TScalar>::operator[](int i)
-{
-	#ifdef SAFE
-		assert(i==0||i==1);
-	#endif
-
-	if (i==0)
-		return x;
-	if (i==1)
-		return eps;
-	
-}
-
-
-
-
-/// set coeff of e^epsPrecision to 'coeff'. TODO: 
-template <typename TScalar>
-inline  void   basicNumber<TScalar>::setValue(TScalar epsExponent, TScalar coeff) 
-{
-	
-	assert(epsExponent==0||epsExponent==1);
-	
-	if ( epsExponent==0 )
-		setX(coeff);
-	else if ( epsExponent==1 )
-		setEps(coeff);
-	else
-		assert(true==false);
-	
-}
-
-
-template <typename TScalar>
-TScalar 	 basicNumber<TScalar>::getValue(TScalar epsExponent)  const
-{
-	if ( epsExponent==0 )
-		return getX();
-	else if ( epsExponent==1 )
-		return getEps();
-	else
-		return 0;
-}
-
-
-template <typename TScalar>
-inline void basicNumber<TScalar>::setX(TScalar xxx)
-{
-	x=xxx;
-}
-
-template <typename TScalar>
-inline void basicNumber<TScalar>::setEps(TScalar _eps) 
-{
-	eps=_eps;
-}
-
-
-
-
-//-------------------------Operators--------------------------------------------------------
-
-template <typename TScalar>
-inline  bool basicNumber<TScalar>::isZero() const
-{
-	return (x==0 && eps==0);
-};
-
-
-template <typename TScalar>
-inline  bool basicNumber<TScalar>::isNotZero() const
-{
-	return (x!=0 || eps!=0);
-};
-
-///comparison; ignores EPS components.
-template <typename TScalar>
-inline int basicNumber<TScalar>::nearlyEqual(const basicNumber z) const
-{
-	return  (x==z.x);
-};
-
-template <typename TScalar>
-inline bool basicNumber<TScalar>::operator==( const basicNumber z) const
-{	
-	return (x==z.getX() && eps==z.getEps());
-}
-
-template <typename TScalar>
-inline bool basicNumber<TScalar>::operator!=( const basicNumber z)  const
-{	
-	return (x!=z.getX() || eps!=z.getEps());
-}
-
-
-/// @todo wieso hast du den Operator += geschrieben? Das birgt Fehleranfälligkeit!
-/*
-template <typename TScalar>
-inline void  basicNumber<TScalar>::operator+=(const basicNumber &z)	
-{
-	//#ifdef SAFE
-		std::cerr <<"Warning: using unsafe +=operator!" << std::endl;
-	//#endif
-	x+=z.x;
-	eps+=z.eps;
-}
-*/
-
-
-
-template <typename TScalar>
-inline void  basicNumber<TScalar>::printMultSecure(std::ostream &os)	const
-{
-	os <<  "(" << *this << ")";
-	 
-}
-
-
-
-//-------------------------Index Computation--------------------------------------------------------
-
-
-
-
-/// @note all index functions must me inter-coordinated
-template <typename TScalar>
-size_t 	
-basicNumber<TScalar>::getPairIndex     (	const basicNumber a, 
-							const basicNumber b, 
-							const TScalar 	characteristic)
-{
-	//return ( (a.eps*characteristic+a.x)*characteristic + b.eps )*characteristic + b.x  ;
-	return ( (a.eps*characteristic+b.eps) * characteristic + a.x ) * characteristic + b.x  ;
-}
-
-template <typename TScalar>
-size_t 	
-basicNumber<TScalar>::getPairIndexByRef(	const basicNumber & a, 
-							const basicNumber & b, 
-							const TScalar 	& characteristic)
-{
-	//return ( (a.eps*characteristic+a.x)*characteristic + b.eps )*characteristic + b.x  ;
-	return ( (a.eps*characteristic+b.eps) * characteristic + a.x ) * characteristic + b.x  ;
-}
-
-template <typename TScalar>
- size_t 	basicNumber<TScalar>::getSingleIndex(const basicNumber b, 
-								 const TScalar  	characteristic)
-{
-	//return  b.eps *characteristic + b.x  ;
-	return  b.eps *characteristic*characteristic + b.x  ;
-}
-
-template <typename TScalar>
- size_t 	basicNumber<TScalar>::getSingleIndexByRef(const basicNumber & b, 
-									const TScalar 	& characteristic)
-{
-	//return  b.eps *characteristic + b.x  ;
-	return  b.eps *characteristic*characteristic + b.x  ;
-}
-
-template <typename TScalar>
- size_t   basicNumber<TScalar>::getMaxSingleIndex(const TScalar characteristic)
-{
-	return (characteristic-1)*characteristic*characteristic + characteristic-1;
-}
-
-template <typename TScalar>
- size_t   basicNumber<TScalar>::getMaxPairIndex  (const TScalar characteristic)
-{
-	return characteristic*characteristic*characteristic*characteristic-1;
-}
-
-
-
-
-//-------------------------IO--------------------------------------------------------
-
-
-template <typename TScalar>
-std::ostream &  operator<<(std::ostream & out, const basicNumber<TScalar>& z)  
-{	
-	out << (int)z.getX();
-
-	if (!z.getEps()==0)
-	{
-		out << " +  ";
-		out << (int)z.getEps() << "*eps^1 " ;
-	}
-	return out;
-}
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-//----------------------fieldScalar----------------------------------------
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-template <typename TScalar>
- const fieldScalar<TScalar> fieldScalar<TScalar>::Zero = fieldScalar<TScalar>(0);
-
-template <typename TScalar>
- const fieldScalar<TScalar> fieldScalar<TScalar>::One = fieldScalar<TScalar>(1);
-
-
-
-//------------------------------Constructors----------------------------------------
-template <typename TScalar>
-inline   fieldScalar<TScalar>::fieldScalar()  : x(0) {};
-
-// x initialisierung vergessen...
-template <typename TScalar>
-inline   fieldScalar<TScalar>:: fieldScalar(std::stringstream & sstream)
-{
-	x=0;
-	sstream >> x;
-	#ifdef DEBUG
-	std::cerr << "parse fieldScalar from stream" << x << std::endl;	
-	#endif
-}
-
-/// constructs afieldScalar {s  }
-template <typename TScalar>
-inline fieldScalar<TScalar>::fieldScalar (TScalar s) : x(s)	 {	 };
-
-
-/// constructs a fieldScalar, epsPrecision is ignored and assumed =0
-template <typename TScalar>
-inline fieldScalar<TScalar>::fieldScalar (TScalar epsPrecision, std::string s ) :x(0)
-{
-	if (epsPrecision!=0)
-	{
-		std::cerr << " allowed epsPrecision is { 0 }" << std::endl;
-		throw(" allowed epsPrecision is { 0 }");
-	}
-	//assert(epsPrecision==0);
-	
-};
-
-/// @note pow call is constructed to be compilable with gcc 3.x
-template <typename TScalar>
-inline bool fieldScalar<TScalar>::wellDefined(unsigned int characteristic)
-{
-
-	// std::cerr << "wellDefined: characteristic" << characteristic << std::endl;
-
-	assert(sizeof(long long)>sizeof(TScalar));	//otherwise the following test does not work
-
-	long long 	test  = pow( 2.0, (int)sizeof(TScalar)*8 )-1;
-	TScalar test2 = test;
-	test = test2;
-
-	if (test<0)
-	{
-		//std::cerr << "TScalar is signed!" << std::endl;
-		assert(pow( 2.0, (int)sizeof(TScalar)*8-1 )>characteristic);
-	}
-	else
-	{
-		std::cerr << "warning: TScalar is unsigned!" << std::endl;
-		assert(pow( 2.0, (int)sizeof(TScalar)*8 )>characteristic);
-	}
-	return true;
-}
-
-
-
-/// copy constructor
-template <typename TScalar>
-inline fieldScalar<TScalar>::fieldScalar (const  fieldScalar<TScalar> & z) 	: x(z.x)	 {};
-
-
-	
-/// constructs a basic number {s  }
-template <typename TScalar>
-inline fieldScalar<TScalar>::fieldScalar (TScalar s, TScalar t) 	: x(s) 	 {};
-
-
-/////////////////////////////////-Properties-------------------------------------------------
-/// returns maximum possible epsPrecision
-template <typename TScalar>
-inline unsigned short fieldScalar<TScalar>::getEpsPrecision() const
-{
-	return 0;
-}
-
-template <typename TScalar>
-inline short fieldScalar<TScalar>::getEpsDegree() const
-{
-	if ( getX() !=0 ) 
-		return 0;
-	else return -1;
-}
-
-
-//-----------------------------Value Access---------------------------------------------------
-
-template <typename TScalar>
-inline   TScalar   fieldScalar<TScalar>::getX() const 
-{
-	return x;
-}
-
-
-/// implementation only for compatibility
-template <typename TScalar>
-inline  TScalar   fieldScalar<TScalar>::getEps() const
-{
-	return (0);
-}
-
-
-template <typename TScalar>
-inline void fieldScalar<TScalar>::setX(TScalar xxx)
-{
-	x=xxx;
-}
-
-
-template <typename TScalar>
-inline void fieldScalar<TScalar>::setEps(TScalar _eps) 
-{
-	if (_eps!=0 ) 
-		assert(true==false);
-}
-
-
-/// set coeff of e^epsPrecision to 'coeff'. 
-///TODO: error checking @todo setValue-Operation nur über den Körper/ Ring laufen lassen?
-template <typename TScalar>
-inline  void   fieldScalar<TScalar>::setValue(TScalar epsPrecision, TScalar coeff) 
-{
-	assert(epsPrecision==0);
-	
-	if (epsPrecision==0)
-		setX(coeff);
-	
-}
-
-template <typename TScalar>
-inline TScalar 	 fieldScalar<TScalar>::getValue(TScalar epsPrecision) const
-{
-	if (epsPrecision==0)
-		return x;
-	return 0;
-}
-
-
-template <typename TScalar>
-inline TScalar& fieldScalar<TScalar>::operator[](int i)
-{
-	#ifdef SAFE
-		assert(i==0);
-	#endif
-
-	if (i==0)
-		return x;
-	return 0;
-	
-}
-
-
-//-----------------------------------Operators-------------------------------------------------
-
-template <typename TScalar>
-inline  bool fieldScalar<TScalar>::isZero() const
-{
-	return (x==0);
-};
-
-
-template <typename TScalar>
-inline  bool fieldScalar<TScalar>::isNotZero() const
-{
-	return (x!=0 );
-};
-
-
-/// @todo wo zum Teufel hast du diesen Operator eingesetzt? Todo: testen, ob nicht aus Versehen zwei 'fieldScalar'-Objekte unbedarft addiert werden können.
-/*
-template <typename TScalar>
-inline void  fieldScalar<TScalar>::operator+=(const fieldScalar &z)	
-{
-	#ifdef SAFE
-		std::cerr <<"Warning: using unsafe +=operator!" << std::endl;
-	#endif
-	x+=z.x;
-}*/
-
-
-
-template <typename TScalar>
-inline bool fieldScalar<TScalar>::operator==( const fieldScalar z)  const
-{	
-	return ( x==z.x );
-}
-
-template <typename TScalar>
-inline bool fieldScalar<TScalar>::operator!=( const fieldScalar z)  const
-{	
-	return ( x!=z.x );
-}
-
-
-/// nearlyEqual-comparison; ignores EPS components.
-template <typename TScalar>
-inline int fieldScalar<TScalar>::nearlyEqual(const fieldScalar z) const
-{
-	return  ( x==z.x );
-};
-
-
-template <typename TScalar>
-inline void 	fieldScalar<TScalar>::printMultSecure(std::ostream &os)	const
-{
-	os <<   (int)getX() ;
-	 
-}
-
-
-
-
-//--------------------Index computation-------------------------------------------------
-
-template <typename TScalar>
-inline size_t 	
-fieldScalar<TScalar>::getPairIndex     (	const fieldScalar a, 
-							const fieldScalar b, 
-							const TScalar 	characteristic)
-{
-	return a.x*characteristic + b.x;
-}
-
-template <typename TScalar>
-inline  size_t 	
-fieldScalar<TScalar>::getPairIndexByRef(	const fieldScalar & a,
-							const fieldScalar & b, 
-							const TScalar 	& characteristic)
-{
-	return a.x*characteristic + b.x;
-}
-
-template <typename TScalar>
-inline size_t 	
-fieldScalar<TScalar>::getSingleIndex	(const fieldScalar b, const TScalar characteristic)
-{
-	return getSingleIndex(b);
-}
-
-
-template <typename TScalar>
-inline size_t 	
-fieldScalar<TScalar>::getSingleIndexByRef	(const fieldScalar & b, const TScalar & characteristic)
-{
-	return getSingleIndexByRef(b);
-}
-
-
-template <typename TScalar>
-inline size_t 	fieldScalar<TScalar>::getSingleIndex		(const fieldScalar b)
-{
-	return b.x;
-}
-
-
-template <typename TScalar>
-inline size_t 	fieldScalar<TScalar>::getSingleIndexByRef	(const fieldScalar & b)
-{
-	return b.x;
-}
-
-
-template <typename TScalar>
- size_t   fieldScalar<TScalar>::getMaxSingleIndex(const TScalar characteristic)
-{
-	return characteristic - 1;
-}
-
-template <typename TScalar>
- size_t  fieldScalar<TScalar>::getMaxPairIndex  (const TScalar characteristic)
-{
-	return characteristic*characteristic - 1;
-}
-
-
-
-
-template <typename TScalar>
-std::ostream &  operator<<(std::ostream & out, const fieldScalar<TScalar>& z)  
-{	
-	out << (int)z.getX();
-
-	return out;
-}
-
-
-
diff --git a/sandbox/hurwitz.kroeker/src/basicNumber.h b/sandbox/hurwitz.kroeker/src/basicNumber.h
deleted file mode 100644
index 50c9d5f..0000000
--- a/sandbox/hurwitz.kroeker/src/basicNumber.h
+++ /dev/null
@@ -1,341 +0,0 @@
-
-#ifndef basicNumber_h
-#define basicNumber_h
-
-
-
-#include <vector>
-#include <iostream>
-#include <assert.h>
-
-
-#include "typedefs.h"
-#include <math.h>
-
-#define STR(X) #X
-#define SW_STATUS(v1)  STR(v1)
-
-
-
-
-
-/** \file basicNumber.h 
-*
-* @brief  contains class representing elements of finite Field F_q and finite Ring F_q[epsilon]. 
-		See also fastNumber.h
-*
-* @author Martin Cremer, redesign Jakob Kröker
-*
-* @todo besseren (sprechenden) Namen einfallen lassen.
-* @todo rename basicNumber (to what?)?
-*
-*/
-
-
-
-
-
-/**
-*
-* @brief basicNumber represents elements of finite Field F_q and  finite Ring F_q[epsilon].  
-* <br> 
-* Limitation: field element representatives assumed as positive and only values 
-		between {0...characterristic-1}
-* 
-@note if data design changes, please update memsetClearAllowed()-function
-*
-
-*
-*
-* @todo implizite TNum Initialisierung nur über den dazugehörigen Ring - mal sehen 
-*
-* @todo Skalar Datentyp abhängig von der Characteristik wählen - ist prinzipiell moeglich
-* 
-* @todo folgende Frage klaeren:<cstdint>) and use the 'int_fastX_t' 
-*
-* @todo als TScalar nur primitive Datentypen zulassen und dies prüfen. Wieso? -> 
-*/
-template <typename TScalar>
-class basicNumber
-{
-
-protected:
-
-	  TScalar x; 	///< represents <b>x*EPS^0</b>
-	  TScalar eps; 	///< represents <b>eps</b>*EPS^1
-
- public:
-
- 	/** @name static data
-         * @{ */
-		typedef TScalar scalarType; // ja? dann sollte man auch fieldScalar als TScalar uebergeben!
-	
-		/// represents zero (<b>x</b>=0 and <b>eps</b>=0)
-		static  const 	basicNumber Zero;//=basicNumber(0);
-		
-		/// represents one (<b>x</b>=1 and <b>eps</b>=0)
-		static  const 	basicNumber One;//=basicNumber(1);
-	/** @} */
-	
- 	/** @name safety
-         * @{ */
-
-		/// returns true, if it is allowed to initialise class objects with memset(0)
-		static inline bool memsetClearAllowed() {	return true; }
-		/** @brief checks, if the datatype TScalar is large enough (in bits) to store 
-				field element representatives {0...characterristic-1}
-
-			in the case, that TScalar is signed, sizeof(TScalar) must be one bit greater 
-			than nessesary to store positive field element representatives {0...characterristic-1}
-		*/
-		static inline bool wellDefined(unsigned int characteristic);
-	/** @} */
-
-	 /** @name Constructors
-         * @{ */
-		/// constructs a basic number {0 + 0*EPS }
-		inline   basicNumber();
-	
-		/// constructs a basic number {s + 0*EPS }
-		inline basicNumber (TScalar s);
-	
-		/// constructs a basic number, epsPrecision is ignored and assumed =1
-		inline basicNumber (TScalar epsPrecision, std::string s );
-	
-		/// constructs a basic number {s + t*EPS }
-		inline basicNumber (TScalar s, TScalar t);
-		
-		/// copy constructor
-		inline basicNumber (const  basicNumber & z);
- 	
-	/** @} */
-
-	 /** @name properties
-         * @{ */
-		inline 	unsigned short	getEpsPrecision() const;
-		inline 	void	setEpsPrecision(int epsPrecision) const {	assert(false); 	};
-		/// returns the highest EpsExponent where the coeffitient is not zero.
-		inline  short	getEpsDegree() const;
-	/** @} */
-
-
-	/** @name data Access
-         * @{ */		
-		inline  TScalar	 	getX()  	const;	///< returns  <b>x</b>
-		inline  TScalar		getEps()  	const;	///< returns  <b>eps</b>
-
-		inline  void 		setX  (TScalar xxx);	///< set <b>x</b>= <b>xxx</b>
-		inline  void 		setEps(TScalar _eps) ;///< set <b>eps</b>= <b>_eps</b>
-
-		/** @brief  get  coefficient with defined EPSPrecision to  {<b>val</b> + <b>coeff</b>*epsPrcision } */
-		inline  TScalar 	getValue(TScalar epsPrecision) const ;
-
-		/** @brief 	set  coefficient with defined EPSPrecision to  {<b>val</b> + <b>coeff</b>*epsPrcision } */
-		inline  void 		setValue(TScalar epsPrecision, TScalar coeff) ;
-	/** @} */
-
-
-	/** @name getset
-         * @{ */
-		inline TScalar& 	operator[](int i);
-
-		// inline void 		operator+=(const basicNumber &z);
-
-	/** @} */
-
-
-	/** @name operators
-         * @{ */
-		/// returs true if (<b>z</b> . x == this -> x);    eps is ignored!
-		inline  int 		nearlyEqual(const basicNumber z) const;
-	
-		inline  bool		isZero() 	const;
-		inline  bool		isNotZero()  	const;
-
-		inline  bool 		operator==( const basicNumber z) const;
-		inline  bool 		operator!=( const basicNumber z) const;
-		
-	/** @} */
-
-
-	/** @name index computation
-         * @{ */
-		static size_t 	getPairIndex     (const basicNumber a,
-								const basicNumber b,
-								const TScalar 	characteristic);
-	
-		static size_t 	getPairIndexByRef(const basicNumber & a, 
-								const basicNumber & b,
-								const TScalar 	& characteristic);
-	
-		static size_t 	getSingleIndex	(const basicNumber b,
-								 const TScalar  	 characteristic);
-
-		static size_t 	getSingleIndexByRef(const basicNumber & 	b,
-								  const TScalar 	  & characteristic);
-
-		static size_t   	getMaxSingleIndex(  const TScalar 	characteristic);
-		static size_t   	getMaxPairIndex  (  const TScalar 	characteristic);
-	/** @} */
-
-		void printMultSecure(std::ostream &os)	const;
-
-};
-
-
-
-
-
-/// @todo bei zusammengesetzten Typen bei getX() und getEPS keinen primitiven Datentyp zurueckliefern, 
-/// sondern einen mit Memberfunktionen wie z.B. isZero.
-
-/// @todo wenn eine Initialisierung von TNum unter Umgehung des Rings geschehen soll, 
-///muss das über einen expliziten Konstruktor-Aufruf	erfolgen, der Fehlerfreiheit zuliebe!
-
-/**  @brief class representing  elements of F_q. 
-<br> Limitation: 
-field element representatives assumed as positive and only values between {0...characterristic-1}
-*/
-template <typename TScalar>
-class fieldScalar
-{
-
-protected:
-
-	  TScalar x; 		///< represents <b>x</b>*EPS^0
-
- public:
-	inline operator int() {return x;}
-	//inline operator uint16_t() {return x;}
-	//inline operator const uint16_t() const {return x;}
-	
-	//operator uint16_t() {return x;}
-	//operator uint32_t() {return x;}
-
-	 /** @name static data
-         * @{ */
-		typedef TScalar scalarType;
-	
-		/// represents zero (<b>x</b>=0 and <b>eps</b>=0)
-		static  const 	fieldScalar Zero;//=fieldScalar(0);
-		
-		/// represents one (<b>x</b>=1 and <b>eps</b>=0)
-		static  const 	fieldScalar One;//=fieldScalar(1);
-	/** @} */
-
-
-		/// returns true, if it is allowed to initialise class objects with memset(0)
-		static inline bool memsetClearAllowed() {	return true; }
-
-		/** @brief checks, if the datatype TScalar is large enough (in bits) to store field element 
-				representatives {0...characterristic-1}
-
-			in the case, that TScalar is signed, sizeof(TScalar) must be one bit greater 
-			than nessesary to store positive field element representatives {0...characterristic-1}
-
-			@todo 
-		*/
-		static inline bool wellDefined(unsigned int characteristic);
-	
-
-	 /** @name Constructors
-         * @{ */
-
-		inline   fieldScalar(std::stringstream  & sstream);
-		/// constructs a basic number {0 + 0*EPS }
-		inline   fieldScalar();
-		//inline   fieldScalar(int bla):x((TScalar)bla) {};
-	
-		/// constructs a basic number {s + 0*EPS }
-		inline fieldScalar (TScalar s);
-		inline fieldScalar (TScalar s,TScalar eps) ; //{ s + 0*EPS }
-	
-		/// constructs a basic number, epsPrecision is ignored and assumed =1
-		inline fieldScalar (TScalar epsPrecision, std::string s );
-		
-		/// copy constructor
-		inline fieldScalar (const  fieldScalar & z);
- 	
-	/** @} */
-
-	 /** @name properties
-         * @{ */
-	
-		inline 	unsigned short	getEpsPrecision() const;
-
-		/// returns the highest EpsExponent where the coeffitient is not zero.
-		inline  short	getEpsDegree() const;
-	/** @} */
-
-
-	/** @name data Access
-         * @{ */
-		
-		inline  TScalar	 	getX()   const;///< returns  <b>x</b>
-		inline  TScalar		getEps()  const;///< returns  <b>0</b>
-
-		inline  void 		setX  (TScalar xxx);	///< set <b>x</b>= <b>xxx</b>
-		inline  void 		setEps(TScalar _eps) ;///<does nothing @TODO : throw Exception !
-
-
-		/// get  coefficient with defined EPSPrecision to  {<b>val</b> + <b>coeff</b>*epsPrcision }
-		inline  TScalar 	getValue(TScalar epsPrecision) const;
-
-		/// set  value to <b>coeff</b> if _epsExponent==0, otherwise does nothing
-		inline  void 		setValue(TScalar _epsExponent, TScalar coeff) ;
-	/** @} */
-
-
-	/** @name getset
-         * @{ */
-		inline TScalar& 	operator[](int i);
-		//inline void 		operator+=(const fieldScalar &z);
-	/** @} */
-
-
-	/** @name operators
-         * @{ */
-		/// returs true if (<b>z</b> . x == this -> x);    eps is ignored!
-		inline  int 		nearlyEqual(const fieldScalar z) const;
-	
-		inline  bool		isZero() 	 const;
-		inline  bool		isNotZero()  	const;
-
-		inline  bool 		operator==( const fieldScalar z) const;
-		inline  bool 		operator!=( const fieldScalar z) const;
-	/** @} */
-
-
-	/** @name index computation
-         * @{ */
-		/// @todo const Correctness
-		inline static size_t 	getSingleIndex		(const fieldScalar b,    
-										 const TScalar 	characteristic  	);
-
-		inline static size_t 	getSingleIndexByRef	(const fieldScalar & b,  
-										const TScalar 	& characteristic	);
-
-		inline static size_t 	getSingleIndex		(const fieldScalar b  );
-
-		inline static size_t 	getSingleIndexByRef	(const fieldScalar & b);
-
-		inline static size_t 	getPairIndex     ( const fieldScalar a,  
-									 const fieldScalar b, 
-									 const TScalar 	characteristic	);
-
-		inline static size_t 	getPairIndexByRef(const fieldScalar & a,
-									const fieldScalar & b,
-									const TScalar 	&characteristic	);
-
-		static size_t   getMaxSingleIndex(const TScalar characteristic	);
-
-		static size_t   getMaxPairIndex  (const TScalar characteristic	);
-	/** @} */
-
-	void printMultSecure(std::ostream &os)	const;
-};
-
-
-	#include "basicNumber.cpp"
-
-#endif // #ifndef basicNumber_h
diff --git a/sandbox/hurwitz.kroeker/src/combinatorics/combinations.h b/sandbox/hurwitz.kroeker/src/combinatorics/combinations.h
deleted file mode 100644
index d8f1d67..0000000
--- a/sandbox/hurwitz.kroeker/src/combinatorics/combinations.h
+++ /dev/null
@@ -1,54 +0,0 @@
-//  (C) Copyright Howard Hinnant 2005-2011.
-//  Use, modification and distribution are subject to the Boost Software License,
-//  Version 1.0. (See accompanying file LICENSE_1_0.txt or copy at
-//  http://www.boost.org/LICENSE_1_0.txt).
-//
-//  See http://www.boost.org/libs/type_traits for most recent version including documentation.
-//  See for GPL compatibility  http://www.gnu.org/licenses/license-list.html 
-
-//  Details are in namespace detail.  Every effort has been made to make
-//  combine_discontinuous and permute as fast as possible.  They minimize the number
-//  of swaps that are performed. Everything else builds on these two primitives. 
-//  The most complicated algorithm is for_each_reversible_permutation.  But it
-//  builds on combine_discontinuous and permute and I believe represents a minimum
-//  number of swaps.  Without care, algorithms such as for_each_reversible_permutation
-//  will take longer than for_each_permutation instead of the intended half the time.
-
-//  Speed is everything.  Lest you could just use std::next_permutation and manually
-//  eliminate duplicate permutations.  If the implementation fails in being orders
-//  of magnitude faster than that, then it has failed miserably.
-
-#pragma once
-
-
-#include <iterator>
-#include <algorithm>
-#include <limits>
-#include <stdexcept>
-
-// from http://marknelson.us/2002/03/01/next-permutation/
-
-template<typename TInt>
-inline TInt naive_next_combination(TInt N, TInt R, TInt c[])
-{
-    TInt i = 0;
-    while ( i <R-1 && c[i+1]==c[i]+1) // for each bump
-        //c[i] = i++;                 // fall back
-        c[i] = i;                 
-        i++;
-    return N - ++c[i];              // push forward and verify
-}
- 
-/// todo: need to test because of changes.
-template<typename TInt>
-inline TInt naive_next_combination_vec(TInt N, TInt R, std::vector<TInt> & c)
-{
-    size_t size = c.size();
-    size_t i = 0;
-    while ( i <size-1 && c[i+1]==c[i]+1) // for each bump
-    {
-        c[i] = i;                 // fall back
-        i++;
-    }
-    return N - ++c[i];              // push forward and verify
-}
diff --git a/sandbox/hurwitz.kroeker/src/combinatorics/partition.h b/sandbox/hurwitz.kroeker/src/combinatorics/partition.h
deleted file mode 100644
index e720552..0000000
--- a/sandbox/hurwitz.kroeker/src/combinatorics/partition.h
+++ /dev/null
@@ -1,28 +0,0 @@
-#include <vector>
-#include <iostream>
-#include <cstdio>
-#include <assert.h>
-#include <iterator>
-
-
-///todo: templatize std::vector<T> and at the same time shrink possible parameters (integers)
-inline bool next_partition_desc(std::vector<int> *p_ptr)
-{
-    assert(p_ptr != NULL);
-    std::vector<int> &p = *p_ptr;
-    if (p.size() < 2)
-        return false;
-
-    int sum = p.back();
-    int i;
-    for (i = p.size() - 2; i > 0 && p[i] + 1 > p[i - 1]; --i)
-    {
-        sum += p[i];
-    }
-    --sum;
-    p[i]++;
-    p.resize(i + 1 + sum);
-    std::fill(p.begin() + i + 1, p.begin() + i + 1 + sum, 1);
-    
-    return true;
-}
diff --git a/sandbox/hurwitz.kroeker/src/configure.ac b/sandbox/hurwitz.kroeker/src/configure.ac
deleted file mode 100644
index c864ee7..0000000
--- a/sandbox/hurwitz.kroeker/src/configure.ac
+++ /dev/null
@@ -1,577 +0,0 @@
-#############################################################################
-##
-#W  configure.ac                                            Laurent Bartholdi
-##                                                              Jakob Kroeker
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2009, Laurent Bartholdi
-##
-#############################################################################
-
-
-# jk: for AC_OPENMP check (parallelization)   2.62 is required! (2.62 available since  2009)
-# AC_PREREQ(2.00)
-AC_PREREQ([2.62])
-
-AC_INIT(fr,,laurent.bartholdi@gmail.com)
-AC_CONFIG_SRCDIR([src/fr_dll.c])
-AC_CONFIG_AUX_DIR(cnf)
-
-# Checks for programs.
-AC_PROG_CC
-
-
-################################################################
-### lines added by jk
-
-    AC_PROG_CXX
-
-    # checking compile flag '-std=c++0x' does somehow not work.
-    # AX_CHECK_COMPILE_FLAG([-std=c++0x], [CXXFLAGS="$CXXFLAGS -std=c++0x"], [ AX_MSG_ERROR( [need  -std=c++0x flag but it did not work]) ] )  
-    #    CXXFLAGS="$CFLAGS  -std=c++0x"
-
-   
-    AC_OPENMP 
-
-    # since some systems have broken OMP libraries
-    # we also check that the actual package will work
-    
-    
-    # @TODO: following check does not work; what is wrong?
-    
-#    ac_pkg_openmp=no
-#    if test -n "${OPENMP_CFLAGS}"; then
-#      AC_MSG_CHECKING([whether OpenMP will work in a package])
-#      AC_LANG_CONFTEST(
-#      [AC_LANG_PROGRAM([[#include <omp.h>]], [[ return omp_get_num_threads (); ]])])
-#      PKG_CFLAGS="${OPENMP_CFLAGS}" PKG_LIBS="${OPENMP_CFLAGS}" "${CURDIR}" CMD SHLIB conftest.c 1>&AS_MESSAGE_LOG_FD 2>&AS_MESSAGE_LOG_FD && "${CURDIR}" --vanilla -q -e "dyn.load(paste('conftest',.Platform\$dynlib.ext,sep=''))" 1>&AS_MESSAGE_LOG_FD 2>&AS_MESSAGE_LOG_FD && ac_pkg_openmp=yes
-#      AC_MSG_RESULT([${ac_pkg_openmp}])
-#    fi
-#
-#    # if ${ac_pkg_openmp} = "yes" then we have OMP, otherwise it will be "no"
-#    if test "${ac_pkg_openmp}" = no; then
-#      OPENMP_CFLAGS=''
-#      # you could put AC_MSG_ERROR here is OpenMP is required
-#      AC_MSG_WARN([NO OpenMP for parallelization detected. Use more recent compiler!]) 
-#    fi 
-    
-#    CFLAGS="$CFLAGS $OPENMP_CFLAGS "
-    CXXFLAGS="$CXXFLAGS $OPENMP_CFLAGS"
-    
-
-# end changes by jk 
-################################################################
-
-                        
-
-# Check for -fno-stack-protector, because we link within GAP
-AC_CACHE_CHECK([whether $CC accepts -fno-stack-protector],
-    [ns_cv_cc__nostackprotector],
-    [save_CFLAGS=$CFLAGS
-     CFLAGS="$CFLAGS -fno-stack-protector"
-     AC_LINK_IFELSE([AC_LANG_PROGRAM([], [])],
-                    [ns_cv_cc__nostackprotector=yes],
-                    [ns_cv_cc__nostackprotector=no])
-     CFLAGS=$save_CFLAGS])
-if test $ns_cv_cc__nostackprotector = yes; then
-     CFLAGS="$CFLAGS -fno-stack-protector"
-fi
-
-################################################################
-# Checks for header files.
-AC_HEADER_STDC
-AC_CHECK_HEADERS([float.h stdlib.h])
-
-# Checks for typedefs, structures, and compiler characteristics.
-AC_C_CONST
-AC_C_INLINE
-
-AC_ARG_VAR([GAPDIR], [Location of the GAP root directory, e.g. ../..])
-
-if test -z "$GAPDIR"; then
-    for dir in ../.. /Applications/gap4r5; do
-	if test -f $dir/sysinfo.gap; then
-	    GAPDIR=$dir
-	    break
-	fi
-    done
-fi
-
-AC_ARG_VAR([CONFIGNAME],[Name of GAP build configuration])
-if test -n "$CONFIGNAME"; then
-    SYSINFO="$GAPDIR/sysinfo.gap-$CONFIGNAME"
-    MAKEFILE="Makefile-$CONFIGNAME"
-    GAPPROG="$GAPDIR/bin/gap-$CONFIGNAME.sh"
-else
-    SYSINFO="$GAPDIR/sysinfo.gap"
-    MAKEFILE="Makefile"
-    GAPPROG="$GAPDIR/bin/gap.sh"
-fi
-
-if ! test -f "$SYSINFO"; then
-    AC_ERROR([Could not locate the GAP root directory;
-        specify its location with './configure GAPDIR=DIR [CONFIGNAME=NAME)]'])
-fi
-
-GAPDIR=`cd $GAPDIR && pwd` # make path absolute
-AC_SUBST(GAPDIR)
-
-. "$SYSINFO"
-TARGET="$GAParch"
-
-echo checking target... "$TARGET"
-
-XTARGET="`cnf/config.guess`-$CC-`echo $TARGET | sed 's/.*-//'`"
-if test "$XTARGET" != "$GAParch_system"; then
-   AC_WARN([The guessed target $XTARGET is not the gap target $GAParch_system. Cross your fingers])
-fi
-AC_SUBST(TARGET)
-
-echo checking gap executable ... "$GAPPROG"
-
-if ! test -e "$GAPPROG"; then
-    AC_WARN([Could not find GAP executable $GAPPROG; I won't compile the documentation])
-fi
-AC_SUBST(GAPPROG)
-
-GAC="$GAPDIR/bin/$TARGET/gac"
-
-echo checking gac compiler... $GAC
-
-if ! test -e "$GAC"; then
-    AC_ERROR([Could not find GAP compiler $GAC])
-fi
-AC_SUBST(GAC)
-
-eval `grep '^c_[[a-z_]]*=' $GAC`
-
-AC_SUBST(c_compiler)
-AC_SUBST(c_options)
-AC_SUBST(c_linker)
-AC_SUBST(c_link_options)
-AC_SUBST(c_libs)
-AC_SUBST(c_dyn_options)
-AC_SUBST(c_dyn_linker)
-AC_SUBST(c_dyn_linking)
-AC_SUBST(c_dynlibs)
-AC_SUBST(c_addlibs)
-
-
-################################################################################################################################
-### jk changes
-
-    #    todo: dependencies between flintlib and mpir, mpft
-    # prevent parallel make on mpfr, mpc, mpfi before mpfr is compiled
-    # if test "$MPFRDIR" == "$EXTERN"; then MPFRDEPEND=mpfrlib; fi       
-    
-    # probably not required: 
-    # AC_SUBST(cxx_compiler)
-    # AC_SUBST(cxx_options)
-    # AC_SUBST(cxx_linker)
-    # AC_SUBST(cxx_link_options)
-    # AC_SUBST(cxx_libs)
-    # AC_SUBST(cxx_dyn_options)
-    # AC_SUBST(cxx_dyn_linker)
-    # AC_SUBST(cxx_dyn_linking)
-    # AC_SUBST(cxx_dynlibs)
-    # AC_SUBST(cxx_addlibs)
-
-
-    ################################################################
-    # mpir configuration
-
-    EXTERN="\$(CURDIR)/bin/$TARGET/extern"
-
-    MPIRDIR="$EXTERN"
-    MPIRINCLUDE=""
-    MPIRLIB=""
-
-    AC_ARG_WITH(mpir,
-     [  --with-mpir=<path>|yes|no|extern
-        Location at which the MPIR library was installed.
-        If the argument is omitted, the library is assumed to be reachable
-        under the standard search path (/usr, /usr/local,...).  Otherwise
-        you must give the <path> to the directory which contains the
-        library. The special value "extern", which is the default, asks Float
-        to compile a version of mpir in the subdirectory extern/.
-     ],
-     [if test "$withval" != extern; then MPIRDIR="$withval"; fi]
-    )
-
-    AC_ARG_WITH(mpir-include,
-     [  --with-mpir-include=<location>
-        Location at which the MPIR include files were installed.],
-     [MPIRINCLUDE="$withval"]
-    )
-
-    AC_ARG_WITH(mpir-lib,
-     [  --with-mpir-lib=<location>
-        Location at which the MPIR library files were installed.],
-     [MPIRLIB="$withval"]
-    )
-
-    if test "$MPIRDIR" != yes; then
-    if test "$MPIRINCLUDE" == ""; then MPIRINCLUDE="$MPIRDIR/include"; fi
-    if test "$MPIRLIB" == ""; then MPIRLIB="$MPIRDIR/lib"; fi
-    fi
-
-    if test "$MPIRINCLUDE" != ""; then
-        CPPFLAGS="$CPPFLAGS -I$MPIRINCLUDE"
-        CFLAGS="$CFLAGS -p -I$MPIRINCLUDE"
-        CXXFLAGS="$CXXFLAGS -p -I$MPIRINCLUDE"
-    fi
-
-    ################################################################
-
-    ################################################################
-    # mpfr configuration
-
-    EXTERN="\$(CURDIR)/bin/$TARGET/extern"
-
-    MPFRDIR="$EXTERN"
-    MPFRINCLUDE=""
-    MPFRLIB=""
-
-    AC_ARG_WITH(mpfr,
-     [  --with-mpfr=<path>|yes|no|extern
-        Location at which the MPFR library was installed.
-        If the argument is omitted, the library is assumed to be reachable
-        under the standard search path (/usr, /usr/local,...).  Otherwise
-        you must give the <path> to the directory which contains the
-        library. The special value "extern", which is the default, asks Float
-        to compile a version of mpfr in the subdirectory extern/.
-     ],
-     [if test "$withval" != extern; then MPFRDIR="$withval"; fi]
-    )
-
-    AC_ARG_WITH(mpfr-include,
-     [  --with-mpfr-include=<location>
-        Location at which the MPFR include files were installed.],
-     [MPFRINCLUDE="$withval"]
-    )
-
-    AC_ARG_WITH(mpfr-lib,
-     [  --with-mpfr-lib=<location>
-        Location at which the MPFR library files were installed.],
-     [MPFRLIB="$withval"]
-    )
-
-    if test "$MPFRDIR" != yes; then
-    if test "$MPFRINCLUDE" == ""; then MPFRINCLUDE="$MPFRDIR/include"; fi
-    if test "$MPFRLIB" == ""; then MPFRLIB="$MPFRDIR/lib"; fi
-    fi
-
-    if test "$MPFRINCLUDE" != ""; then
-        CPPFLAGS="$CPPFLAGS -I$MPFRINCLUDE"
-        CFLAGS="$CFLAGS -p -I$MPFRINCLUDE"
-        CXXFLAGS="$CXXFLAGS -p -I$MPFRINCLUDE"
-    fi
-
-    ################################################################
-
-### end changes by jk
-################################################################################################################################
-
-
-# gmp configuration
-
-GMPDIR="$GAPDIR/bin/$TARGET/extern/gmp"
-GMPINCLUDE=""
-GMPLIB=""
-
-AC_ARG_WITH(gmp,
- [  --with-gmp=<location>|yes|no|gap
-    Location at which the GMP library, needed for FR, was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "gap", which is the default, asks FR
-    to use the version of gmp included in the GAP distribution.
- ],
- [if test "$withval" != gap; then GMPDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(gmp-include,
- [  --with-gmp-include=<location>
-    Location at which the GMP include files were installed.],
- [GMPINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(gmp-lib,
- [  --with-gmp-lib=<location>
-    Location at which the GMP library files were installed.],
- [GMPLIB="$withval"]
-)
-
-if test "$GMPDIR" != yes; then
-if test "$GMPINCLUDE" == ""; then GMPINCLUDE="$GMPDIR/include"; fi
-if test "$GMPLIB" == ""; then GMPLIB="$GMPDIR/lib"; fi
-fi
-
-echo using GMP directory... $GMPDIR
-
-if test "$GMPINCLUDE" != ""; then
-    CPPFLAGS="$CPPFLAGS -I$GMPINCLUDE"
-    CFLAGS="$CFLAGS -p -I$GMPINCLUDE"
-fi
-AC_CHECK_HEADER(gmp.h,[],[AC_MSG_ERROR([library gmp not found. Specify its location using --with-gmp])],[])
-
-################################################################
-# Check for gsl library
-
-EXTERN="\$(CURDIR)/bin/$TARGET/extern"
-LIB_TARGET=""
-
-GSLDIR="$EXTERN"
-GSLINCLUDE=""
-GSLLIB=""
-AC_ARG_WITH(gsl,
- [  --with-gsl=<path>|yes|no|extern
-    Location at which the GSL library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of gsl in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then GSLDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(gsl-include,
- [  --with-gsl-include=<location>
-    Location at which the GSL include files were installed.],
- [GSLINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(gsl-lib,
- [  --with-gsl-lib=<location>
-    Location at which the GSL library files were installed.],
- [GSLLIB="$withval"]
-)
-
-if test "$GSLDIR" != yes; then
-if test "$GSLINCLUDE" == ""; then GSLINCLUDE="$GSLDIR/include"; fi
-if test "$GSLLIB" == ""; then GSLLIB="$GSLDIR/lib"; fi
-fi
-
-echo using GSL directory... $GSLDIR
-
-if test "$GSLINCLUDE" != ""; then
-    CPPFLAGS="$CPPFLAGS -I$GSLINCLUDE"
-    CFLAGS="$CFLAGS -I$GSLINCLUDE"
-fi
-
-if test "$GSLDIR" == "$EXTERN"; then
-    LIB_TARGET="$LIB_TARGET gsllib"
-else
-    AC_CHECK_HEADER(gsl/gsl_vector.h,[],[AC_MSG_ERROR([library gsl not found. Specify its location using --with-gsl])],[])
-fi
-
-if test "$GSLLIB" != ""; then
-    LIBS="$LIBS -L$GSLLIB"
-    GACFLAGS="$GACFLAGS -L -L$GSLLIB -L -Wl,-rpath,$GSLLIB -L -lgsl -L -lgslcblas"
-    if test "$GSLLIB" != "$EXTERN/lib"; then
-        AC_CHECK_LIB([gsl],[gsl_multiroot_fsolver_set],,
-            [AC_ERROR([The GSL library could not be found. It is needed for IMG calculations.])],[-lgslcblas])
-
-        AC_CHECK_LIB([gslcblas],[cblas_ctrmv],,
-            [AC_ERROR([The GSL CBlas library could not be found. It is needed for IMG calculations.])])
-    fi
-fi
-
-################################################################
-# Check for givaro library
-
-GIVARODIR="$EXTERN"
-GIVAROINCLUDE=""
-GIVAROLIB=""
-AC_ARG_WITH(givaro,
- [  --with-givaro=<path>|yes|no|extern
-    Location at which the Givaro library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of givaro in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then GIVARODIR="$withval"; fi]
-)
-
-AC_ARG_WITH(givaro-include,
- [  --with-givaro-include=<location>
-    Location at which the Givaro include files were installed.],
- [GIVAROINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(givaro-lib,
- [  --with-givaro-lib=<location>
-    Location at which the Givaro library files were installed.],
- [GIVAROLIB="$withval"]
-)
-
-if test "$GIVARODIR" != yes; then
-if test "$GIVAROINCLUDE" == ""; then GIVAROINCLUDE="$GIVARODIR/include"; fi
-if test "$GIVAROLIB" == ""; then GIVAROLIB="$GIVARODIR/lib"; fi
-fi
-
-echo using Givaro directory... $GIVARODIR
-
-if test "$GIVAROINCLUDE" != ""; then
-    CPPFLAGS="$CPPFLAGS -I$GIVAROINCLUDE"
-    CFLAGS="$CFLAGS -I$GIVAROINCLUDE"
-fi
-
-if test "$GIVARODIR" == "$EXTERN"; then
-    LIB_TARGET="$LIB_TARGET givarolib"
-else
-    AC_CHECK_HEADER(givaro-config.h,[],[AC_MSG_ERROR([library givaro not found. Specify its location using --with-givaro])],[])
-fi
-
-if test "$GIVAROLIB" != ""; then
-    LIBS="$LIBS -L$GIVAROLIB"
-    #GACFLAGS="$GACFLAGS -L -L$GIVAROLIB -L -Wl,-rpath,$GIVAROLIB -L -lgivaro"
-fi
-
-################################################################
-# external programs configuration
-
-AC_PATH_PROGS(DOT,[dot],[],[$PATH$PATH_SEPARATOR/usr/local/graphviz/bin])
-
-if test -z "$DOT"; then
-    AC_WARN([Could not find 'dot' (debian package graphviz)... you won't be able to draw automata])
-fi
-
-AC_PATH_PROG(DISP,[display])
-
-if test -z "$DISP"; then
-    AC_WARN([Could not find 'display' (debian package imagemagick)... you won't be able to draw automata])
-fi
-
-AC_PATH_PROG(APPLETVIEWER,[appletviewer])
-
-if test -z "$APPLETVIEWER"; then
-    AC_WARN([Could not find 'appletviewer' (debian package java-6-sdk)... you won't be able to draw spiders])
-fi
-
-# Check for java compiler
-AC_CHECK_PROGS(JAVAC,[javac])
-
-if test -z "$JAVAC"; then
-    AC_WARN([Could not find java compiler... you won't be able to draw spiders])
-else
-    JAVABUILD="java/javaplot.class java/javaview.jar"
-fi
-AC_SUBST(JAVABUILD)
-AC_SUBST(GACFLAGS)
-AC_SUBST(LIBS)
-AC_SUBST(LIB_TARGET)
-
-################################################################
-# generate files
-
-WITHGMP=""
-
-INCLGMP=""
-LINKGMP=""
-
-if test "$GMPDIR" != ""; then
-   WITHGMP="$WITHGMP --with-gmp=$GMPDIR"
-fi
-
-
-if test "$GMPINCLUDE" != "";  then
-    INCLGMP="-I$GMPINCLUDE"
-    if test "$GMPLIB" != ""; then
-        LINKGMP="-L$GMPLIB"
-        # changes by jk: WITHGMP should define either '--with-gmp' or '--with-gmp-include' AND '--with-gmp-lib' !
-        WITHGMP="$ --with-gmp-include=$GMPINCLUDE  --with-gmp-lib=$GMPLIB"
-    fi
-fi
-
-if test "$GMPLIB" != ""; then
-    LINKGMP="-L$GMPLIB"
-    if test "$GMPINCLUDE" != "";  then
-        INCLGMP="-I$GMPINCLUDE"
-        # changes by jk: WITHGMP should define either '--with-gmp' or '--with-gmp-include' AND '--with-gmp-lib' !
-        WITHGMP="$ --with-gmp-include=$GMPINCLUDE  --with-gmp-lib=$GMPLIB"
-    fi
-fi
-
-if test "$WITHGMP" = "";  then
-    AC_ERROR([ Please set GMPDIR or GMPLIB and GMPINCLUDE! ])
-fi;
-
-
-
-AC_SUBST(WITHGMP)
-AC_SUBST(INCLGMP)
-AC_SUBST(LINKGMP)
-
-
-################################################################
-## changes by jk
-    WITHMPIR=""
-    WITHMPFR=""
-    
-  
-    if test "$MPIRDIR" != ""; then
-       WITHMPIR="$WITHMPIR --with-mpir=$MPIRDIR"
-    fi
-    
-    if test "$MPIRLIB" != ""; then
-       WITHMPIRLIB="$  --with-mpir-lib=$MPIRLIB"
-       LINKMPIR=" -L$MPIRLIB "
-    fi
-
-    if test "$MPIRINCLUDE" != ""; then
-       WITHMPIRINCLUDE="$  --with-mpir-include=$MPIRINCLUDE"
-       INCLMPIR=" -I$MPIRINCLUDE "
-    fi
-
-    if test "$WITHMPIR" = "";  then
-        AC_ERROR([ MPIR not found! ])
-    fi;
-
-  
-    if test "$MPFRDIR" != ""; then
-       WITHMPFR="$WITHMPFR --with-mpfr=$MPFRDIR"
-    fi
-
-    if test "$MPFRLIB" != ""; then
-       WITHMPFRLIB="$  --with-mpfr-lib=$MPFRLIB"
-       LINKMPFR=" -L$MPFRLIB "
-    fi
-
-    if test "$MPFRINCLUDE" != ""; then
-       WITHMPFRINCLUDE="$  --with-mpfr-include=$MPFRINCLUDE"
-       INCLMPFR=" -I$MPFRINCLUDE "
-    fi
-    
-    if test "$WITHMPFR" = "";  then
-        AC_ERROR([ MPFR not found! ])
-    fi;
-
-    AC_SUBST(WITHMPFR)
-    AC_SUBST(WITHMPIR)
-# end changes by jk
-################################################################
-
-
-mkdir -p bin/$TARGET
-CONFIG_STATUS=bin/$TARGET/config.status
-
-AC_CONFIG_FILES([$MAKEFILE:cnf/Makefile.in])
-
-if test "$MAKEFILE" != Makefile; then
-    ln -sf "$MAKEFILE" Makefile
-fi
-
-if test "$GSLDIR" == "$EXTERN" -o "$GIVARODIR" == "$EXTERN"; then
-    echo -n "****** Remember to download:"
-    if test "$GSLDIR" == "$EXTERN"; then echo -n " gsl-1.15.tar.gz"; fi
-    if test "$GIVARODIR" == "$EXTERN"; then echo -n " givaro-3.6.0.tar.gz"; fi
-    echo; echo "****** (instructions in extern/GET_LIBRARIES)"
-fi
-
-AC_OUTPUT
diff --git a/sandbox/hurwitz.kroeker/src/fastNumber.cpp b/sandbox/hurwitz.kroeker/src/fastNumber.cpp
deleted file mode 100644
index c9d2268..0000000
--- a/sandbox/hurwitz.kroeker/src/fastNumber.cpp
+++ /dev/null
@@ -1,808 +0,0 @@
-
-/*
-#ifdef INTEL
-
-#include "fastNumber.h
-
-
-
-
-template <int CHAR,class TScalar> 
-const number_eps0<CHAR,TScalar> number_eps0<CHAR,TScalar>::Zero(0);
-
-template <int CHAR,class TScalar> 
-const number_eps0<CHAR,TScalar> number_eps0<CHAR,TScalar>::One(1);
-
-template <int CHAR,class TScalar> 
-const int number_eps0<CHAR,TScalar>::bitsize(needbits<CHAR>::value);
-
-template <int CHAR>
-const number_eps1<CHAR> number_eps1<CHAR>::Zero=number_eps1<CHAR>(0);
-
-template <int CHAR>
-const number_eps1<CHAR> number_eps1<CHAR>::One=number_eps1<CHAR>(1);
-*/
-
-
-
-
-
-
-
-//-----------------------------------------------------number_eps1-----------------------------------
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	const number_eps1<CHAR, TScalar, TScalarPair>
-	number_eps1<CHAR, TScalar, TScalarPair>::Zero = number_eps1<CHAR, TScalar, TScalarPair>(0);
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	const number_eps1<CHAR, TScalar, TScalarPair> 
-	number_eps1<CHAR, TScalar, TScalarPair>::One = number_eps1<CHAR, TScalar, TScalarPair>(1);
-
-
-
-
-//------------------------------------------ Constructors -------------------------------
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline number_eps1<CHAR, TScalar, TScalarPair>::number_eps1() : epsx(0)	{	};
-
-
-
-	/**
-	@brief einheitlicher Konstruktor fuer eine Zahl mit beliebigen EpsPrecision
-	*
-	* @todo Konstruktor fuer eine Zahl mit belibigen EpsPrecision:
-	* Problem: eine 0 wird als leerer String interpretiert, bzw, ein char als ein Integer-Wert
-	* Insgesamt noch keine gute Loesung
-	*/
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline number_eps1<CHAR, TScalar, TScalarPair>::
-	number_eps1(int epsPrec, std::string dummy)		:	epsx(0)
-	{
-
-		if (epsPrec!=1)
-		{
-			std::cerr << " allowed epsPrecision is {  1 }" << std::endl;
-			throw(" allowed epsPrecision is   {  1 }");
-			//assert(epsPrec==1);
-		}
-	}
-
-	///constructs (x,0) from x
-	/// @todo wieso scheitert dieser Test bei der Kombination char/short und Charakteristik =29 ? - nein, scheitert nicht für Charakteristik=29 sondern für Charakteristik=197.
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	 inline number_eps1<CHAR, TScalar, TScalarPair>::number_eps1 (TScalar x) :	epsx(x)
-	 {
-		#ifdef SAFE
-			//cerr << " <CHAR> "<<  CHAR << endl;
-			//cerr << "needbits<CHAR>::doubledvalue="<< needbits<CHAR>::doubledvalue << endl;
-			//cerr << "sizeof(TScalarPair)*8="<< sizeof(TScalarPair)*8 << endl;
-			 assert (needbits<CHAR>::doubledvalue<sizeof(TScalarPair)*8);
-		#endif
-	 };
-	
-	/// @todo:   bereits waehrend des Compilevorgangs prüfen, 
-	/// ob die Datenstrukturen gross genug ausgelegt sind	 -  , es reicht aber auch, vor der ersten Verwendung die Tests Durchzuführen.
-	///
-	///@brief Konstruiert number_eps1 (x,eps) aus number_eps1(x,eps)
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline number_eps1<CHAR, TScalar, TScalarPair>::
-	number_eps1 (const  number_eps1<CHAR, TScalar, TScalarPair> & z_x) :	epsx( z_x.epsx )
-	 {
-		#ifdef SAFE
-			 assert (needbits<CHAR>::doubledvalue<sizeof(TScalarPair)*8);
-		#endif
-	 };
-	 
-	///Konstruiert number_eps1(x,eps) aus (x,eps)
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline number_eps1<CHAR, TScalar, TScalarPair>::
-	number_eps1 (TScalar x, TScalar eps):  epsx((eps << bitsize)|x)//:epsx(s),eps(t)
-	 {
-		#ifdef SAFE
-		  // todo: sollte bereits waehrend des Compilevorgangs geprft werden
-			 assert(fullbitsize<sizeof(TScalarPair)*8);
-		#endif
-	 };
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline  short	number_eps1<CHAR, TScalar, TScalarPair>::getEpsDegree() const
-		{
-			if ( getEps()!=0 )
-				return 1;
-			else if ( getX() !=0 ) 
-				return 0;
-			else return -1;
-		}
-
-//------------------------------------------ Safety-------------------------------
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline bool number_eps1<CHAR, TScalar, TScalarPair>::wellDefined(unsigned int characteristic)
-		{
-
-		//	std::cerr << "wellDefined: characteristic" << characteristic << std::endl;
-		return wellDefined();
-	}
-		
-	/// @todo Grenzen fuer enums ueberpruefen
-	template	 <int CHAR, typename TScalar, typename TScalarPair>
-	 inline bool number_eps1<CHAR, TScalar, TScalarPair>::wellDefined()
-	{
-		assert(sizeof(long long)>sizeof(TScalar));	//otherwise the following test does not work
-
-		/// trage in Tscalar test2 an jede zulässige Bitstelle Einsen ein.
-		long long 	test  = pow( 2, sizeof(TScalar)*8 )-1;
-		TScalar test2 = test;
-		test = test2;
-
-		if (test<0)
-		{
-		//	std::cerr << "TScalar is signed!" << std::endl;
-			assert( sizeof(TScalar)*8-1>=bitsize);
-		}
-		else
-		{
-			std::cerr << "warning: TScalar is unsigned!" << std::endl;
-			assert( sizeof(TScalar)*8>=bitsize);
-		}
-
-		assert(sizeof(long long)>sizeof(TScalarPair));	//otherwise the following test does not work
-
-			test  = pow( 2, sizeof(TScalar)*8 )-1;
-			test2 = test;
-		test = test2;
-
-		if (test<0)
-		{
-		//	std::cerr << "TScalarPair is signed!" << std::endl;
-			assert( sizeof(TScalarPair)*8-1>=fullbitsize);
- 			assert (needbits<CHAR>::doubledvalue<sizeof(TScalarPair)*8);
-		}
-		else
-		{
-			std::cerr << "warning: TScalarPair is unsigned!" << std::endl;
-			assert( sizeof(TScalarPair)*8>=fullbitsize);
- 			assert (needbits<CHAR>::doubledvalue<=sizeof(TScalarPair)*8);
-		}
-		return true;			
-	}
-
-//------------------------------------------ Data Access-------------------------------
-
-	/// get x from (x,eps)
-	template <int CHAR, typename TScalar, typename TScalarPair>
-
-	inline TScalar number_eps1<CHAR, TScalar, TScalarPair>::getX() const 
-	{
-		return ( maskx&epsx );
-	}
-
-	/// get eps from (x,eps)
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline TScalar  	number_eps1<CHAR, TScalar, TScalarPair>::getEps() const
-	{
-		#ifdef COUNT
-			bitwiseShift+=1;
-		#endif	
-		return ( epsx >> needbits<CHAR>::value );
-	}
-
-	
-	/// set x in (x,eps)
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline void  	number_eps1<CHAR, TScalar, TScalarPair>::setX(TScalar x)  
-	{
-		#ifdef COUNT
-			bitwiseOR+=1;
-			bitwiseAND++;
-		#endif	
-		///todo: Assert, that x has not too much bits!
-		epsx = ( epsx & maskeps ) | x ; 
-	}
-
-	/// setzt eps in (x,eps)
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline void 	number_eps1<CHAR, TScalar, TScalarPair>::setEps(TScalar eps) 
-	{
-		#ifdef COUNT
-			bitwiseOR+=1;
-			bitwiseShift+=1;
-			bitwiseAND++;
-		#endif	
-		epsx = (epsx & maskx) | (TScalarPair) (eps << needbits<CHAR>::value ); 
-	}
- 
-	
-	/**
-	* @brief setzt entweder .x oder .eps gleich 'val', je nach 'eps_exponent'-Wert
-	*
-	* @param _epsPrecision beinhaltet die epsilon--Potenz von val - mit val ist gemeint \f$ VAL=val*(eps^eps\_exponent) \f$
-	* @param val der Koeffizient von  (\f$ eps^\_epsPrecision \f$)
-	* @todo Funktionsbezeichnung ungluecklich, setMonom passt aber auch nicht.
-	*/
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline void  	
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	setValue(  unsigned short _epsPrecision, TScalar val)
-	{
-		if (_epsPrecision==0)
-			setX(val);
-		else if (_epsPrecision==1)
-			setEps(val);
-		else if ( val!=0 )
-			assert(true==false);
-
-			
-	}
-
-//------------------------------------------ Operators-------------------------------
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline  bool 	number_eps1<CHAR, TScalar, TScalarPair>::isZero() const	
-	{	
-		return (epsx==0);	
-	};
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline  bool 	number_eps1<CHAR, TScalar, TScalarPair>::isNotZero() const	
-	{
-		return (epsx!=0);	
-	};
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline bool 
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	nearlyEqual(const number_eps1<CHAR, TScalar, TScalarPair> & z) const
-	  {
-		  return  ( getX()==z.getX() );
-	  };
-
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline int  
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	operator==(const  number_eps1<CHAR, TScalar, TScalarPair> & z) const
-	{
-		return epsx == z.epsx;
-	}
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline int  
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	operator!=(const  number_eps1<CHAR, TScalar, TScalarPair> & z) const
-	{
-		return epsx != z.epsx;
-	}
-
-
-
-//------------------------------------------ Index computing -------------------------------
-
-	
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	// inline size_t number_eps1<CHAR, TScalar, TScalarPair>::
-	//getSingleIndex(const number_eps1<CHAR, TScalar, TScalarPair> b)
-	inline size_t 	 
-	number_eps1<CHAR, TScalar, TScalarPair>::getSingleIndex(const number_eps1<CHAR, TScalar, TScalarPair> b)
-	{
-		#ifdef COUNT
-			bitwiseShift	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		// warum mal zwei? -> weil epsx den eos0 und eps1-Anteil speichert!
-		return( (size_t) b.epsx);
-	
-	}
-
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t 
-	number_eps1<CHAR, TScalar, TScalarPair>::getSingleIndexByRef(
-									const number_eps1<CHAR, TScalar, TScalarPair> & b )
-	{
-		#ifdef COUNT
-			bitwiseShift	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		//  mal zwei weil epsx den eos0 und eps1-Anteil speichert!
-		return( (size_t) b.epsx);
-	}
-	
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t
-	number_eps1<CHAR, TScalar, TScalarPair>::getPairIndex(
-								const number_eps1<CHAR, TScalar, TScalarPair> a,
-								const number_eps1<CHAR, TScalar, TScalarPair> b)
-	{
-		#ifdef COUNT
-			bitwiseShift	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		//  mal zwei, weil epsx den eps0 und eps1-Anteil speichert!
-		return( ((size_t)a.epsx<< (needbits<CHAR>::doubledvalue)) | (size_t)b.epsx );
-	}
-	
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t 
-	number_eps1<CHAR, TScalar, TScalarPair>::getPairIndexByRef(
-									const number_eps1<CHAR, TScalar, TScalarPair>& a,
-									const number_eps1<CHAR, TScalar, TScalarPair>& b)
-	{
-		#ifdef COUNT
-			bitwiseShift	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		//  mal zwei, weil epsx den eps0 und eps1-Anteil speichert!
-		return( ((size_t)a.epsx<< (needbits<CHAR>::doubledvalue)) | (size_t) b.epsx );
-	}
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t 
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	getSingleIndex(const number_eps1<CHAR, TScalar, TScalarPair> b,
-											const TScalar characteristic)
-	{
-
-		#ifdef SAFE
-			assert(characteristic==CHAR);
-		#endif 
-		return number_eps1<CHAR, TScalar, TScalarPair>::getSingleIndex(b);
-	}
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t 
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	getSingleIndexByRef(		const number_eps1<CHAR, TScalar, TScalarPair>& b,
-						const TScalar & characteristic)
-	{
-
-		#ifdef SAFE
-			assert(characteristic==CHAR);
-		#endif 
-		return number_eps1<CHAR, TScalar, TScalarPair>::getSingleIndexByRef(b);
-	}
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t 
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	getPairIndex(			const number_eps1<CHAR, TScalar, TScalarPair> a, 
-						const number_eps1<CHAR, TScalar, TScalarPair> b, 
-						const TScalar  					characteristic	)
-	{
-		#ifdef SAFE
-			assert(characteristic==CHAR);
-		#endif 
-		return number_eps1<CHAR, TScalar, TScalarPair>::getPairIndex(a,b);
-	}
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t 
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	getPairIndexByRef(const number_eps1<CHAR, TScalar, TScalarPair>	& a,
-				const number_eps1<CHAR, TScalar, TScalarPair>	& b, 
-				const TScalar 						& characteristic	)
-	{
-		#ifdef SAFE
-			assert(characteristic==CHAR);
-		#endif 
-		return number_eps1<CHAR, TScalar, TScalarPair>::getPairIndexByRef(a, b);
-	}
-
-
-
-
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t   
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	getMaxSingleIndex(const TScalar characteristic)
-	{
-		//#ifdef SAFE
-			assert(characteristic==CHAR);
-		//#endif 
-
-		number_eps1<CHAR, TScalar, TScalarPair> num (characteristic-1,characteristic-1);
-
-		return number_eps1<CHAR, TScalar, TScalarPair>::getSingleIndex(num);
-		//return nextpow2num<CHAR>::value*nextpow2num<CHAR>::value;
-	}
-
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	inline size_t   
-	number_eps1<CHAR, TScalar, TScalarPair>::
-	getMaxPairIndex  (const TScalar characteristic)
-	{
-		//#ifdef SAFE
-		if (characteristic!=CHAR)
-		{
-			std::cerr << "characteristic" << characteristic <<  std::endl;
-			std::cerr << "CHAR" << CHAR << std::endl;
-		}
-			assert(characteristic==CHAR);
-		//#endif 
-		number_eps1<CHAR, TScalar, TScalarPair> num1 (characteristic-1, characteristic-1);
-		number_eps1<CHAR, TScalar, TScalarPair> num2 (characteristic-1, characteristic-1);
-	
-		return number_eps1<CHAR, TScalar, TScalarPair>::getPairIndex(num1, num2);
-		//return nextpow2num<CHAR>::value*nextpow2num<CHAR>::value*nextpow2num<CHAR>::value*nextpow2num<CHAR>::value;
-	}
-	
-//------------------------------------------ IO -------------------------------
-
-	
-	template <int CHAR, typename TScalar, typename TScalarPair>
-	std::ostream &  
-	operator<<(std::ostream & out, const number_eps1<CHAR, TScalar, TScalarPair>& z)
-	{  
-	
-		out << (int)z.getX() ;
-		if (z.getEps()!=0)
-		{
-			out << " +  ";
-			out << (int)z.getEps()  << "*eps " ;
-		}
-		return out;
-	} ;
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
- //-----------------------------(number_eps0)--------------------------------------------
-
-
-
-	template <int CHAR, class TScalar> 
-	const number_eps0<CHAR, TScalar> 
-	number_eps0<CHAR, TScalar>::Zero(0);
-	
-	
-	template <int CHAR, class TScalar> 
-	const number_eps0<CHAR, TScalar> 
-	number_eps0<CHAR, TScalar>::One(1);
-
-
-
-
-//-----------------------------------Constructors-----------------------------------------------------
-
-
-	template <int CHAR, class TScalar> 
-	inline 
-	number_eps0< CHAR, TScalar >::number_eps0() :x(0)
-	{
-		//x=0;
-	};
-	
-	/// @todo: es sollte waehrend des Compilevorgangs oder zumindest einmal während des Programmstarts geprueft werden,
-	/// ob der interne Datentyp groß  genug ausgelegt ist.
-	///
-	/// create .x from (_x).
-	template <int CHAR, class TScalar>  
-	inline number_eps0< CHAR, TScalar >::number_eps0 (TScalar _x) :x(_x)
-	{
-	};
-
-	
-		///create .x from (_x,eps). eps is ignored
-	template <int CHAR, class TScalar> 
-	inline 
-	number_eps0< CHAR, TScalar >::number_eps0 (TScalar _x, TScalar eps):  x(_x)
-	{ 
-	};
-	
-	
-	/**
-	@brief einheitlicher Konstruktor fuer eine Zahl mit belibigen EpsPrecision
-	*
-	* @todo Konstruktor fuer eine Zahl mit belibigen EpsPrecision:
-	* Problem: eine 0 wird als leerer String interpretiert, bzw. ein char als ein Integer-Wert.
-	* Insgesamt noch keine gute Loesung.
-	*/
-	template <int CHAR, class TScalar> 
-	inline 	
-	number_eps0< CHAR, TScalar >::number_eps0(int epsPrec, std::string dummy):x(0)
-	{
-		if (epsPrec!=0)
-		{
-			std::cerr << " allowed epsPrecision is { 0 }" << std::endl;
-			throw(" allowed epsPrecision is { 0 }");
-		}
-		//assert(epsPrec==0);
-	}
-//--------------------------------------Safety-----------------------------------------------------
-	
-	
-	template <int CHAR, class TScalar> 
-	inline bool 
-	number_eps0< CHAR, TScalar >::wellDefined()
-	{
-		assert(sizeof(long long)>sizeof(TScalar));	//otherwise the following test does not work
-	
-		long 	test  = pow( 2, sizeof(TScalar)*8 )-1;
-		TScalar test2 = test;
-		test = test2;
-	
-		if (test<0)
-		{
-		//	std::cerr << "TScalar is signed!" << std::endl;
-			assert( sizeof(TScalar)*8-1>=bitsize);
-		}
-		else
-		{
-			std::cerr << "warning: TScalar is unsigned!" << std::endl;
-			assert( sizeof(TScalar)*8>=bitsize);
-		}
-		return true;
-	}
-	
-	
-	template <int CHAR, class TScalar> 
-	inline  short	
-	number_eps0< CHAR, TScalar >::getEpsDegree() const
-	{
-		if ( getX() !=0 ) 
-			return 0;
-		else return -1;
-	}
-
-//--------------------------------------Data Access------------------------------------------------------
-	
-	template <int CHAR, class TScalar> 
-	inline TScalar 	
-	number_eps0< CHAR, TScalar >::getX() 	const 
-	{
-		return (x);	
-	};
-
-	template <int CHAR, class TScalar> 
-	inline void 
-	number_eps0< CHAR, TScalar >::setX(const TScalar _x)	
-	{
-		x = _x;	
-	};
-
-	/// returns 0
-	template <int CHAR, class TScalar> 
-	inline TScalar 	
-	number_eps0< CHAR, TScalar >::getEps() 	const 
-	{	
-		  return 0; 
-	}	
-
-
-	template <int CHAR, class TScalar> 
-	inline void 	
-	number_eps0< CHAR, TScalar >::setEps(const TScalar eps) 	const 
-	{
-		 if (eps!=0)	
-			assert(true==false); 	
-	};
-
-
-	template <int CHAR, class TScalar> 
-	inline int 		
-	number_eps0< CHAR, TScalar >::getValue( unsigned short _epsExp) const
-	{
-		if(_epsExp==0) 
-			return x; 
-		return 0;	
-	};
-
-
-	/**
-	* @brief set  .x to 'coeff' if  _epsExponent==0, otherwise nothing
-	*
-	* @param _epsExponent beinhaltet die epsilon--Potenz von val -
-	*  mit val ist gemeint VAL=coeff*(eps^eps_exponent)
-	* @todo Funktionsbezeichnung ungluecklich, setMonom passt aber auch nicht
-	*/
-		
-	template <int CHAR, class TScalar> 
-	inline void number_eps0< CHAR, TScalar >::setValue( unsigned short _epsExponent, TScalar coeff)
-	{
-		if (_epsExponent==0)
-			x = coeff;
-		else  if ( coeff!=0 )
-			assert(true==false);
-	}
-	
-
-
-//------------------------------------ Index Computation ---------------------------------------------------
-	
-	template <int CHAR, class TScalar> 
-	inline size_t 	
-	number_eps0< CHAR, TScalar >::getSingleIndex(const number_eps0< CHAR, TScalar >  b)  
-	{
-		return( (size_t)b.x );
-	}
-	
-	
-	template <int CHAR, class TScalar> 
-	inline  size_t 	
-	number_eps0< CHAR, TScalar >::getSingleIndexByRef(const number_eps0< CHAR, TScalar > & b)  
-	{
-		return( (size_t)b.x );
-	}
-	
-	template <int CHAR, class TScalar> 
-	inline  size_t 	
-	number_eps0< CHAR, TScalar >::getPairIndex(const number_eps0< CHAR, TScalar >  a, 
-											const number_eps0< CHAR, TScalar > b)  
-	{
-		#ifdef SAFE
-			size_t res = a.x;
-			res = ( (res<<bitsize) | b.x );
-			assert( res==( ((size_t)a.x<< bitsize) | b.x) );
-		#endif
-		return( ((size_t)a.x<< needbits<CHAR>::value) | (size_t)b.x );
-	}
-	
-	
-	template <int CHAR,class TScalar> 
-	inline  size_t 	
-	number_eps0< CHAR, TScalar >::getPairIndexByRef(const number_eps0< CHAR, TScalar > & a, 
-									const number_eps0< CHAR, TScalar > & b)  
-	{
-		#ifdef SAFE
-			size_t res = a.x;
-			res = ( (res<<bitsize) | b.x );
-			assert( res==( ((size_t)a.x<<bitsize) | b.x ) );
-		#endif
-		return( ( (size_t)a.x<< needbits<CHAR>::value ) | (size_t)b.x );
-	}
-	
-	
-	template <int CHAR,class TScalar> 
-	inline size_t 
-	number_eps0< CHAR, TScalar >::getSingleIndex	(const number_eps0< CHAR, TScalar > b,
-									const TScalar 			characteristic)
-	{
-		return getSingleIndex(b);
-	}
-	
-	
-	template <int CHAR,class TScalar> 
-	inline size_t 	
-	number_eps0< CHAR, TScalar >::getSingleIndexByRef(const number_eps0< CHAR, TScalar > & b, 
-									const TScalar 			& characteristic)
-	{
-		return getSingleIndexByRef(b);
-	}
-	
-	
-	template <int CHAR, class TScalar> 
-	inline size_t 
-	number_eps0< CHAR, TScalar >::getPairIndex(const number_eps0< CHAR, TScalar > a, 
-								const number_eps0< CHAR, TScalar > b, 
-								const TScalar 		characteristic)
-	{
-		return getPairIndex(a,b);
-	}
-	
-	
-	template <int CHAR, class TScalar> 
-	inline size_t 	
-	number_eps0< CHAR, TScalar >::getPairIndexByRef( const number_eps0< CHAR, TScalar > & a,
-									const number_eps0< CHAR, TScalar > & b, 
-									const TScalar 				& characteristic)
-	{
-		return getPairIndexByRef(a,b);
-	}
-	
-	
-	template <int CHAR, class TScalar> 
-	inline size_t   
-	number_eps0< CHAR, TScalar >::getMaxSingleIndex(const TScalar characteristic)
-	{
-		return( (size_t)(characteristic-1) );
-	}
-	
-	
-	template <int CHAR, class TScalar> 
-	inline size_t   
-	number_eps0< CHAR, TScalar >::getMaxPairIndex  (const TScalar characteristic)
-	{
-		return  ( ( (size_t)(characteristic-1)<<bitsize) | (size_t)(characteristic-1) );
-	}
-
-//----------------------- Operators ---------------------------------------------------
-
-	template <int CHAR, class TScalar> 
- 	inline  bool 	
-	number_eps0< CHAR, TScalar >::isZero()    const		
-	{
-		return ( x==0 );     
-	};
-
-		
-	template <int CHAR, class TScalar> 
-	inline  bool 	
-	number_eps0< CHAR, TScalar >::isNotZero() const 		
-	{
-		return ( x!=0 );     
-	};
-
-		/// compare only the .x-Component
-	template <int CHAR, class TScalar> 
-	inline bool 
-	number_eps0< CHAR, TScalar >::nearlyEqual(const number_eps0 z) 	const 
-	{
-		return ( x == z.x );    
-	};
-
-
-	template <int CHAR, class TScalar> 
-	inline int 	
-	number_eps0< CHAR, TScalar >::operator==(const  number_eps0 & z)	const	
-	{	
-	 	return ( x == z.x );	
-	}
-
-
-	template <int CHAR, class TScalar> 
-	inline int 	
-	number_eps0< CHAR, TScalar >::operator!=(const  number_eps0 & z)	const	
-	{
-		return ( x != z.x );	
-	}
-
-//----------------------- IO (number_eps0) ---------------------------------------------------
-
-
-	template <int CHAR,class TScalar> 
-	std::ostream &  
-	operator<<(std::ostream & out, const number_eps0<CHAR, TScalar>& z)
-	{  
-	
-		out << (int)z.getX() ;
-		if (z.getEps()!=0)
-		{
-			out << " +  ";
-			out << (int)z.getEps()  << "*eps " ;
-		}
-		return out;
-	} ;
-
-
-
-
-/*
-
-#endif // ifdef INTEL
-
-*/
diff --git a/sandbox/hurwitz.kroeker/src/fastNumber.h b/sandbox/hurwitz.kroeker/src/fastNumber.h
deleted file mode 100755
index be3d72f..0000000
--- a/sandbox/hurwitz.kroeker/src/fastNumber.h
+++ /dev/null
@@ -1,376 +0,0 @@
-#ifndef improved_zahl
-#define improved_zahl
-
-
-
-#include "CompileFunctions.h"
-#include <math.h>
-#define STR(X) #X
-#define SW_STATUS(v1)  STR(v1)
-
-/** \file fastNumber.h
-*
-* @brief  contains optimized (packed) datatypes for elements of  finite Field  F_q[] and finite Ring  F_q[epsilon]. <br>Field characteristic is static and have to be defined during compile time. See also basicNumber.h.
-*
-* number_eps1(epsPRecision=1) ,<br>
-* number_eps0 (epsPRecision=0),<br>
-* 
-* @todo The interfaces of  number_eps1 nnumber_eps0 and epsZahl should be identical! 
-* @note inheritance was not used to define an explizit interface, because this would slow down the program
-* there exists some complicated template methods to define a interface without performance loss, but that is on the todo list
-*
-@todo:  Fehlertest für die ausreichende Dimensierung der Datentype (insb. TScalar) bereits zur Kompilezeit durchführen
-*
-
-* @note  implementation note: Error: cannot declare member function ‘static int Foo::bar()’ to have static linkage
-if you declare a method to be static in your .cc file.
-The reason is that static means something different inside .cc files than in class declarations 
-It is really stupid, but the keyword static has three different meanings. In the .cc file, 
-the static keyword means that the function isn't visible to any code outside of that particular file.
-This means that you shouldn't use static in a .cc 
-*/
-
-using namespace std;
-
-
-
-/**
-* @brief  Class representing elements of F_q[epsilon];<br> 
-*  compact datatype for (x,eps)-Pair; field characteristic is parametrized during compile time
-*
-*datatype for (x,eps)-Pair; 
------------number_eps1 DATA LAYOUT<br>
-// Data is stored compact in a 'short int' as follows: <br>
-// first 'bitsize' bits for 'x' and next 'bitsize' bits for 'eps'<br>
-// MSB ist the first bit of 'x'<br>
-// LSB ist the last bit of 'eps'<br>
-Der Template-Parameter CHAR ist die Charakteristik des Koerpers, dessen Werte in number_eps1.x , bzw number_eps1.eps<br>
-dargestellbar sein sollen. CHAR ist auf 256 beschraenkt! <br>
-*
-* @todo security check: Template-Parameter CHAR <=sizeof(TScalar) and (CHAR*CHAR)<=sizeof(TScalarPair) !
-*
-
-* @todo statt (int getPairIndex) (size_t getPairIndex)?
-*
-* @todo herausfinden, warum und um wieviel uebergabe per referenz in manchen Fällen schneller ist.
-* basierend auf diesem Wissen könnte  man sich die Funktionen getxxxByRef eventzell ersparen!
-*/
-template <int CHAR, typename TScalar, typename TScalarPair>
-struct number_eps1
-{
- public:
-
-		typedef 	TScalar scalarType; 	
-
-	/** @name  value representation
-         * @{ */
-		TScalarPair 	epsx; ///< data 
-	/** @} */ 
-
-	/** @name static data
-         * @{ */
-		static  const number_eps1 	Zero;//=number_eps1(0);
-		static  const number_eps1 	One;//=number_eps1(1);
-	
-		enum { bitsize		= needbits<CHAR>::value		}; ///< number of reserved bits for x or eps   in epsx
-		enum { fullbitsize	= needbits<CHAR>::doubledvalue	}; ///< number of reserved bits for x AND eps  in epsx
-	
-		enum { maskx	= pow2<needbits<CHAR>::value>::valueMinusOne	}; ///< bitmask for  x
-		
-		/** @brief  bitmask for  eps*/
-		enum { maskeps	= pow2<needbits<CHAR>::doubledvalue>::valueMinusOne - ( pow2<needbits<CHAR>::value>::valueMinusOne)	};
-	/** @} */ 
-
-	/** @name safety
-         * @{ */ 
-
-		/// returns true, if it is allowed to initialise class objects with memset(0)
-		static inline bool memsetClearAllowed() {	return true; }
-		
-		static inline bool wellDefined(unsigned int characteristic);
-		
-		/// @todo Grenzen fuer enums ueberpruefen
-		static inline bool wellDefined();
-	/** @} */
-
-	/** @name Constructors
-         * @{ */ 
-
-		inline number_eps1();
-	
-		/**  @brief einheitlicher Konstruktor fuer eine Zahl mit beliebigen EpsPrecision - notwendig ???
-		*
-		* @todo allgemeiner Konstruktor fuer eine Zahl mit belibigen EpsPrecision:
-		* Problem: eine 0 wird als leerer String interpretiert, bzw, ein char als ein Integer-Wert
-		* Insgesamt noch keine gute Loesung	*/
-		inline number_eps1(int epsPrec, string dummy) ;
-	
-		/** @brief constructs (x,0) from x */
-		inline number_eps1 (scalarType x);
-		
-		/** @brief copy constructor */
-		inline number_eps1 (const  number_eps1 & z_x) ;
-		
-		/** @brief constructs x + eps*EPS  */
-		inline number_eps1 (scalarType x, scalarType eps);
- 	/** @} */ 
-
-	/** @name properties
-         * @{ */
-		inline unsigned short	getEpsPrecision() const 	{	return 1;	}; ///< returns 1
-
-		inline void	setEpsPrecision(int epsPrecision) const 	{	assert( epsPrecision==1);	}; ///< returns 1
-
-		/// returns the highest EpsExponent where the Coeffitient is not zero.
-		inline  short	getEpsDegree() const;
-		
-	/** @} */ 
-
-
-	/** @name data access
-         * @{ */
-		inline scalarType 	getX() const ;	///< get x from  (x,eps)
-		inline scalarType 	getEps() const;	///< get eps from (x,eps)
-	
-		inline void 		setX(scalarType x)  ;///<  set x in (x,eps)
-		inline void 		setEps(scalarType eps) ;///< set eps in (x,eps)
-		inline void 		setValue( unsigned short _epsPrecision, scalarType val);
-
-		inline int 		getValue( unsigned short _epsPrecision) 
-		{	
-			if(_epsPrecision==0) 		return getX(); 
-			else if (_epsPrecision==1) 	return getEps();
-			else	return 0;
-		 };
-	/** @} */ 
-
-
-	/** @name operators
-         * @{ */
-		inline  bool 	isZero() const	;
-		inline  bool 	isNotZero() const	;
-
-		/** @brief 	compare  x-components, eps-parts are ignored */
-	 	inline bool 	nearlyEqual(const number_eps1 & z) const;
-
-		inline int 	operator==(const  number_eps1<CHAR, TScalar, TScalarPair> & z) const;
-		inline int 	operator!=(const  number_eps1<CHAR, TScalar, TScalarPair> & z) const;
-	/** @} */ 
-
-
-	/** @name regular index computation interface
-         * @{ */
-		/** @brief 		returns  b.epsx	*/
-		static 
-		inline size_t 	getSingleIndex	   (   const number_eps1<CHAR, TScalar,TScalarPair>  b,
-									 const TScalar 				characteristic ) ;
-		
-		/** @brief 		returns  b.epsx	*/
-		static 
-		inline size_t 	getSingleIndexByRef( 	const number_eps1<CHAR, TScalar,TScalarPair> & b,
-									 const TScalar & characteristic ) ;
-
-		/** @brief 		computes a*(2^(fullbitsize)) + b.epsx	*/
-		static 
-		inline size_t	getPairIndex	 (	const number_eps1<CHAR, TScalar,TScalarPair> a, 
-									const number_eps1<CHAR, TScalar,TScalarPair> b, 
-									const TScalar characteristic) ;
-	
-		/** @brief 		computes a*(2^(fullbitsize)) + b.epsx	*/
-		static 
-		inline size_t	getPairIndexByRef(	const number_eps1<CHAR, TScalar,TScalarPair>& a, 
-									const number_eps1<CHAR, TScalar,TScalarPair>& b,
-									const TScalar & characteristic) ;
-	
-		
-		static inline size_t 	getMaxSingleIndex(const TScalar characteristic) ;
-		static inline size_t 	getMaxPairIndex  (const TScalar characteristic) ;
- 	/** @} */ 
-
-	/** @name reduced index computation interface
-         * @{ */
-		/** @brief 		returns  b.epsx	*/
-		static inline size_t	getSingleIndex		( const number_eps1<CHAR, TScalar,TScalarPair> b ) ;
-		
-		/** @brief 		returns  b.epsx	*/
-		static inline size_t 	getSingleIndexByRef	( const number_eps1<CHAR, TScalar,TScalarPair>& b ) ;
-
-		/** @brief 		computes a*(2^(fullbitsize)) + b.epsx	*/ 
-		static inline size_t 	getPairIndex	 (	const number_eps1<CHAR, TScalar,TScalarPair> a,
-										const number_eps1<CHAR, TScalar,TScalarPair> b) ;
-	
-		/** @brief 		computes a*(2^(fullbitsize)) + b.epsx	*/
-		static inline size_t 	getPairIndexByRef(	const number_eps1<CHAR, TScalar,TScalarPair>& a, 
-										const number_eps1<CHAR, TScalar,TScalarPair>& b) ;
-	
-	/** @} */ 
-};
-
-
-
-
-
-/**
-* @brief Datatype for an element of an finite field with characteristik 'CHAR'.
-*
-*datatype for (x,); 
------------number_eps0 DATA LAYOUT--------------------<br>
-// Data is stored  in a 'TScalar' as follows: <br>
-// first 'bitsize' bits for 'x' and no  'bits' for epsilon!
-
-Template parameter CHAR determines the maximal possible regular value. <br>
-The TScalar is the internal type for the stored value.
-
-Der Template-Parameter CHAR ist die Charakteristik des Koerpers, dessen Werte in number_eps0.x
-dargestellbar sein sollen.
-*  maximal zulaessiger CHAR-Wert  haengt vom Template-Datentyp 'datatype' ab!
-*
-* @todo Sicherheitspruefung: maximal zulaessiger Template-Parameter CHAR <=sizeof(datatype)*8!
-*
-** @todo warnen, wenn als DataType ein unsigned ding verwendet wird 
-*
-* @todo einmalig warnen wenn  (bitsize>=sizeof(TScalar)*8) - 
-*      dann kann nicht im Speicher subtrahiert werden
-
-* @todo einmalig warnen wenn  (bitsize>=(sizeof(TScalar)-1)*8) - 
-*      dann kann nicht im Speicher addiert werden (es kommt zum Überlauf)
-*
-* @todo size_t or NOT size_t as return type for index funtions?
-*
- @todo in den Indexfunktionen eventuell bitsize durch  needbits<CHAR>::value ersetzen, weil schneller!
-*
-*/
-template <int CHAR, class TScalar> 
-struct number_eps0
-{
- public:
-	
-	//operator int() {return x;}
-
-	TScalar x; ///< number_eps0  data
-
-	typedef TScalar scalarType; 	///< number datatype
-
-	static  const number_eps0 	Zero;
-	static  const number_eps0 	One;
-
-	/// @todo 3rd template parameter with delivers reserved bits for stored data
-	enum{  bitsize = needbits<CHAR>::value }; 
-
-
- 	/** @name Constructors
-         * @{ */ 
-		inline number_eps0() ; ///< value is set to ::Zero;
-
-		inline number_eps0 (TScalar _x) ;///<create  number_eps0, .x ist set to _x. 
-		
-	 	inline number_eps0 (TScalar _x, TScalar eps) ;///<create  number_eps0, .x ist set to _x, eps is ignored
-	 
-	 	inline number_eps0(int epsPrec, std::string dummy);///<create  number_eps0 with epsprecision=epsPrec. fails if epsPrec is not 0 
-	/** @} */
-	
-	/** @name safety
-         * @{ */ 
-		
-		/// returns true, if it is allowed to initialise class objects with memset(0)
-		static inline bool memsetClearAllowed() {	return true; }
-
-		static inline bool wellDefined();
-
-		static inline bool wellDefined(unsigned int characteristic)
-		{
-			return wellDefined();
-		}
-	/** @} */
-	
-
-	/** @name properties
-         * @{ */ 
-		
-		inline unsigned short 	getEpsPrecision() const { 	return 0;  	};
-
-		/// returns the highest EpsExponent where the coeffitient is not zero.
-		inline  short		getEpsDegree() 	const;
-
-	/** @} */
-
-	/*inline explicit operator int () 	{	return x; 	} *///...
-	
-	/** @name index computation regular interface
-         * @{ */
-		/// returns  a.x*(2^bitsize) + b.x 
-		 static inline  size_t 	getPairIndex	 (	const number_eps0<CHAR, TScalar>  a,
-								 		const number_eps0<CHAR, TScalar> b, 
-										const TScalar characteristic) ;
-
-		/// returns  a.x*(2^bitsize) + b.x
-	 	 static inline size_t 	getPairIndexByRef(const number_eps0<CHAR, TScalar> & a,
-									const number_eps0<CHAR, TScalar> & b,
-									const TScalar &  characteristic) ;
-	
-		/// returns   b.x
-		 static inline size_t 	getSingleIndex		(const number_eps0<CHAR, TScalar>  b,
-								 		const TScalar characteristic)  ;
-		/// returns  b.x
-		 static inline size_t 	getSingleIndexByRef	(const number_eps0<CHAR, TScalar> & b,
-								 		const TScalar &  characteristic)  ;
-
-		static inline size_t   getMaxSingleIndex(const TScalar characteristic);
-		static inline size_t   getMaxPairIndex  (const TScalar characteristic);
-	/** @} */
-
-	/** @name index computation reduced interface
-         * @{ */
-		
-		/// returns  a.x*(2^bitsize) + b.x
-		 static inline  size_t 	getPairIndex	 (	const number_eps0<CHAR, TScalar>  a,
-								 		const number_eps0<CHAR, TScalar> b) ;
-
-		/// returns  a.x*(2^bitsize) + b.x
-	 	 static inline size_t 	getPairIndexByRef(	const number_eps0<CHAR, TScalar> & a,
-										const number_eps0<CHAR, TScalar> & b) ;
-	
-		/// returns   b.x
-		 static inline size_t 	getSingleIndex		(const number_eps0<CHAR, TScalar>  b)  ;
-
-		/// returns  b.x 
-		 static inline size_t 	getSingleIndexByRef	(const number_eps0<CHAR, TScalar> & b)  ;
-
-	/** @} */
-
-	/** @name data access
-         * @{ */ 
-		inline TScalar 	getX() 				const  ;
-		inline void 	setX(const TScalar _x) ;
-
-		inline TScalar 	getEps() 				const ;
-
-		inline void 	setEps(const TScalar eps) 	const ;
-
-		///	sets entweder .x to coeff if _epsExp==0, otherwise does nothing
-		inline void 	setValue( unsigned short _epsExp, 
-							TScalar 	  coeff    );
-
-		inline int 		getValue( unsigned short _epsExp) const;
-	/** @} */
-	
-
-	/** @name operators
-         * @{ */ 
-		 inline  bool 	isZero()    const	 ;
-	 	 inline  bool 	isNotZero() const  ;
-
-		/// compare only the .x-Component
-		inline bool nearlyEqual(const number_eps0 z) 	const  ;
-
-		inline int 	operator==(const  number_eps0 & z)	const	 ;
-		inline int 	operator!=(const  number_eps0 & z)	const	 ;
-	
-	/** @} */
-};
-
-
-	#include "fastNumber.cpp"
-
-
-#endif
diff --git a/sandbox/hurwitz.kroeker/src/fast_Ring.cpp b/sandbox/hurwitz.kroeker/src/fast_Ring.cpp
deleted file mode 100755
index a6fa094..0000000
--- a/sandbox/hurwitz.kroeker/src/fast_Ring.cpp
+++ /dev/null
@@ -1,1394 +0,0 @@
-/** @file fast_Ring.cpp
-*
-* @brief contains fast_Ring implementation
-*/
-
-#include <cstdlib>
-#include <exception>
-#include <new>
-
-
-/// @todo hier pruefen, ob tNum gross genug ausgelegt ist
-template <class TNum, class kdefs>
-fast_Ring<TNum,kdefs>::fast_Ring(	unsigned short _char, 
-						unsigned short _epsPrec) : 	characteristic(_char),
-											epsilon(_epsPrec), 
-											generator(getGenerator())
-{
-	assert(TNum::wellDefined(characteristic));
-	assert( epsilon <= 1 );
-    assert( isGenerator(generator));
-	init();
-	assert( wellDefined() );
-}
-
-template <class TNum, class kdefs>
-fast_Ring<TNum,kdefs>::fast_Ring(   unsigned short _char, 
-                        unsigned short _epsPrec, short _generator) :  characteristic(_char),
-                                            epsilon(_epsPrec), 
-                                            generator( Convert(_generator) )
-{
-    assert( TNum::wellDefined(characteristic) );
-    assert( epsilon <= 1 );
-    assert( isGenerator(generator));
-    init();
-    assert( wellDefined() );
-}
-
-template <class TNum, class kdefs>
-bool 		fast_Ring<TNum,kdefs>::wellDefined()
-{
-	TNum num;
-	assert (num.wellDefined(characteristic) );
-	return true;
-}
-
-/// @todo warum  dieser Init-Kram ? gibt sowieso nur einen Konstruktor, aber nun gut...
-template <class TNum,class kdefs>
-inline void	fast_Ring< TNum, kdefs>::init() 
-{
-	additiveInverseTable		=NULL;
-	multiplicationTable		=NULL;
-	additionTable			=NULL;
-	multiplicativeInverseTable	=NULL;
-	
-	fastAdditionTable		=NULL;
-	elementsToExponentsTab		=NULL;
-	exponentsToElementTab		=NULL;
-
-	sqrtTable		=NULL;
-	
-	moduloTable = NULL;
-
-	bContainsImagNum_m=false;
-
-	imagNum_m=0;
-
-	try
-	{
-		if (additionTable==NULL)
-			additionTable = createAdditionTable();
-	
-		if (additiveInverseTable==NULL)
-			additiveInverseTable = createAdditiveInverseTable();
-	
-		if (multiplicationTable==NULL)
-			multiplicationTable = createMultiplicationTable();
-		
-	
-		if (multiplicativeInverseTable==NULL)
-			multiplicativeInverseTable = createMultiplicativeInverseTable();
-	
-		if (fastAdditionTable==NULL)
-			fastAdditionTable = createFastAdditionTable();
-	
-		if (elementsToExponentsTab==NULL)
-			elementsToExponentsTab = initElementsToExponentsTab(generator);
-	
-		if (exponentsToElementTab==NULL)
-			exponentsToElementTab = initExponentsToElementTab(generator);
-
-		if (sqrtTable==NULL)
-			sqrtTable = createSqrtTable( );
-
-		if (moduloTable==NULL)
-			moduloTable=createModuloTable();
-	}
-	catch(std::bad_alloc &e)
-	{
-		std::cerr << "Memory allocation error in fast_Ring::init() " << std::endl;
-		exit(0);
-	}
-	catch(...)
-	{
-		std::cerr << "Error in creating ring operation Tables, " << std::endl;
-		exit(0);
-	}
-}
-
-
-
-template <class TNum,class kdefs>
-fast_Ring<TNum,kdefs>::~fast_Ring()
-{
-	if (additiveInverseTable!=NULL) 		{ 	delete[] additiveInverseTable;	
-									additiveInverseTable = NULL;	}
-
-	if (multiplicationTable!=NULL) 		{	 delete[] multiplicationTable;	
-									multiplicationTable = NULL;	}
-
-	if (additionTable!=NULL) 			{ 	delete[] additionTable;	 
-									additionTable = NULL;		}
-
-	if (multiplicativeInverseTable!=NULL) 	{	 delete[] multiplicativeInverseTable;
-									 multiplicativeInverseTable = NULL;	}
-	
-	if ( fastAdditionTable!=NULL   ) 		{ 	delete[] 	fastAdditionTable;	 
-									fastAdditionTable = NULL;		}
-
-	if ( elementsToExponentsTab!=NULL ) 	{ 	delete[] 	elementsToExponentsTab; 
-									elementsToExponentsTab = NULL;	}
-
-	if ( exponentsToElementTab!=NULL ) 		{ 	delete[] 	exponentsToElementTab;	 
-									exponentsToElementTab = NULL;	}
-
-	if ( sqrtTable!=NULL ) 			{ 	delete[] 	sqrtTable;	 
-									sqrtTable = NULL;	}
-
-	if ( moduloTable!=NULL ) 			{ 	delete[] 	moduloTable;	 
-									moduloTable = NULL;	}
-
-}
-
-
-
-
-
-//----------------------Convert---------------------------------------------------
-
-
-/**
-
-@param src TConvNum object src  must implement getX() and getEps() -Interface .
- In general this can be replaced by getValue(epsPrecision)-Interface, 
-but is not neccessary in this specialized class
-*/
-
-template <class TNum, class kdefs>
-template <class TConvNum >
-inline  TNum fast_Ring<TNum, kdefs>::Convert(const TConvNum  src ) const
-{
-	#ifdef SAFE
-		assert( getEpsPrecision()<=1 );
-	#endif
-	
-	TNum 	z;
-	
-	z.setX( ConvertScalar( src.getX() ) );
-	//alternativ: 
-	//int 	currEpsPrecision = 0;
-	//z.setValue(currEpsPrecision, ConvertScalar( a.getValue(currEpsPrecision) ) );
-	
-	if ( getEpsPrecision()==1 )
-	{
-		z.setEps( ConvertScalar(src.getEps() ) );
-		//alternativ: 
-		//currEpsPrecision=1;
-		//z.setValue(currEpsPrecision, ConvertScalar( a.getValue(currEpsPrecision) ) );
-	}
-	return z;
-}
-
-template <class TNum, class kdefs>
-inline  TNum fast_Ring<TNum, kdefs>::Convert(const double  a) const
-{
-	#ifdef SAFE
-		assert( getEpsPrecision()<=1 );
-	#endif
-	
-	TNum 	z;
-	
-	z.setX( ConvertScalar( a ) );
-	
-	return z;
-}
-
-template <class TNum, class kdefs>
-inline int  fast_Ring<TNum, kdefs>::repToInt(const  TNum & z )    const
-{
-    assert( getEpsPrecision()==0 );
-    return z.getX();
-}
-
-
-template <class TNum, class kdefs>
-inline  TNum fast_Ring<TNum, kdefs>::Convert(const int  a) const
-{
-	#ifdef SAFE
-		assert( getEpsPrecision()<=1 );
-	#endif
-	
-	TNum 	z;
-	
-	z.setX( ConvertScalar( a ) );
-	
-	return z;
-}
-
-template <class TNum, class kdefs>
-inline  TNum fast_Ring<TNum, kdefs>::Convert(const short  a) const
-{
-    #ifdef SAFE
-        assert( getEpsPrecision()<=1 );
-    #endif
-    
-    TNum    z;
-    
-    z.setX( ConvertScalar( a ) );
-    
-    return z;
-}
-
-template <class TNum, class kdefs>
-inline  TNum fast_Ring<TNum, kdefs>::Convert(const unsigned long  a) const
-{
-    #ifdef SAFE
-        assert( getEpsPrecision()<=1 );
-    #endif
-    
-    TNum    z;
-    
-    z.setX( ConvertScalar( a ) );
-    
-    return z;
-}
-
-/*
-template <class TNum, class kdefs>
-template < const int>
-inline  TNum fast_Ring<TNum, kdefs>::Convert(const int  a) const
-{
-	#ifdef SAFE
-		assert( getEpsPrecision()<=1 );
-	#endif
-	
-	TNum 	z;
-	
-	z.setX( ConvertScalar( a ) );
-	//alternativ: 
-	//int 	currEpsPrecision = 0;
-	//z.setValue(currEpsPrecision, ConvertScalar( a.getValue(currEpsPrecision) ) );
-	
-	return z;
-}*/
-
-/// riscy in some cases? does currently ignore the case where TConvNum.getEpsPrecision > 1.
-/// @TODO 	assert( getEpsPrecision()<=1 ); gehoert in den Konstruktor dieser Klasse, 
-///		da sie offenbar nicht mit EPSPrecision >1 arbeiten kann und muss. 
-///		An anderen Stellen kann diese Abfrage entfernt werden. 
-template <class TNum,class kdefs>
-template <class TConvNum >
-inline  void fast_Ring<TNum, kdefs>::ConvertInPlace( TConvNum & a) const
-{
-
-	assert( a.getEpsPrecision()<=1 );
-	
-	
-	a.setX( ConvertScalar(a.getX() ) );
-	
-	if ( getEpsPrecision()==1 )
-		a.setEps( ConvertScalar(a.getEps() ) );
-
-	#ifdef SAFE
-		assert(a.getX()   ==  ConvertScalar(a.getX() ) );
-		assert(a.getEps() ==  ConvertScalar(a.getEps() ) );
-	#endif
-
-	return ;
-}
-
-/// @todo TNum::scalarType zurueckgeben oder bei int bleiben?
-template <class TNum, class kdefs>
-inline int	 fast_Ring<TNum,kdefs>::ConvertScalar(const int  a) const
-{
-	int res = a;
-	while (res<0)
-	{
-		res += getCharacteristic();
-	}
-	if ( res >= getCharacteristic() ) 
-	{	
-		res %= getCharacteristic();
-	}
-	// Alternativ zur Modulo-Rechnung:
-	//while (res >=getCharacteristic()<)
-	//{
-	//	res -= getCharacteristic();
-	//}
-	return res;
- }
-
-
-/// convert a integer to Ring element. Assumption: <b>a </b> >=0
-template <class TNum,class kdefs>
-inline int fast_Ring<TNum,kdefs>::ConvertScalarSpec(const int a) const
-{
-	#ifdef SAFE
-		assert(a>=0);
-	#endif
-	return 	a % getCharacteristic();
- }
-
-
- 
-/** @brief convert a integer to Ring Elemen. Assumption: <b>a </b> >=-getCharacteristic()
-/// @pre assumption: a >=-getCharacteristic()
-*/
- template <class TNum,class kdefs>
-inline  int fast_Ring<TNum,kdefs>::FastConvertScalar(const int  a) const
-{
-	return ( a + getCharacteristic() ) % getCharacteristic();
- }
-
-
-
-
-
-
-
-
-//----------------------Add---------------------------------------------------
-
-template <class TNum,class kdefs>
-inline TNum 	fast_Ring< TNum, kdefs>::add( const TNum a, const  TNum b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-	return additionTable[ getPairIndex(a, b) ];
-}
-
-
-
-
-template <class TNum,class kdefs>
-inline TNum 	fast_Ring< TNum, kdefs>::addRef( const TNum &a, const  TNum &b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-	return additionTable[ getPairIndexByRef(a, b) ];
-}
-
-
-
-
-
-//----------------------Add in place---------------------------------------------------
-
-template <class TNum,class kdefs>
-inline void fast_Ring< TNum, kdefs>::addInPlace(TNum& a, const TNum b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-
-	a= this->additionTable[ getPairIndex(a, b) ];
-	return;
-
-	
-}
-
-	
-template <class TNum,class kdefs>
-inline void fast_Ring< TNum, kdefs>::addInPlaceRef(TNum& a, const TNum &b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-
-	a = this->additionTable[ getPairIndexByRef(a, b) ];
-	return;
-}
-
-
-
-
-//----------------------Additive Inverse---------------------------------------------------
-
-
-template <class TNum,class kdefs>
-inline TNum  fast_Ring< TNum, kdefs>::addInv(const TNum a) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-	#endif
-	return additiveInverseTable[ getSingleIndex(a) ];
-}
-
-
-
-
-template <class TNum,class kdefs>
-inline TNum  fast_Ring< TNum, kdefs>::addInvRef(const TNum& a) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-	#endif
-	return additiveInverseTable[ getSingleIndexByRef(a) ];
-}
-
-
-
-template <class TNum, class kdefs>
-inline void	fast_Ring< TNum, kdefs>::addInvInPlace( TNum  & a) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-	#endif
-	a=additiveInverseTable[ getSingleIndexByRef(a) ];
-	return;
-}
-
-
-
-
-
-
-//-------------------------------multiply-------------------------------------------
-
-
-
-
-
-template <class TNum,class kdefs>
-inline  TNum   fast_Ring< TNum, kdefs>::multiply(const TNum a, const TNum b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-
-	return multiplicationTable[getPairIndex(a, b)];
-}
-
-
-
-// inline bringt hier kaum Zeitvorteil.
-///multipliziert zwei Zahlen
-template <class TNum,class kdefs>
- inline  TNum  fast_Ring< TNum, kdefs>::multiplyRef(const TNum & a, const TNum & b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-
-	return multiplicationTable[getPairIndexByRef(a, b)];
-}
-
-
-
-//-------------------------------multiply in place-------------------------------------------
-
-
-
-template <class TNum,class kdefs>
-inline void  fast_Ring< TNum, kdefs>::multiplyInPlace(TNum &a, const TNum b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-	a = multiplicationTable[ getPairIndex(a, b) ];
-}
-
-
-template <class TNum,class kdefs>
-inline void  fast_Ring< TNum, kdefs>::multiplyInPlaceRef(TNum &a, const TNum &  b) const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-	#endif
-	a = multiplicationTable[ getPairIndexByRef(a, b) ];
-}
-
-//-------------------------------scalarmultiply-------------------------------------------
-
-
-
-
-
-template <class TNum,class kdefs>
-inline  TNum   
-fast_Ring< TNum, kdefs>::scalarMultiply(const FieldType::ElementType a, const TNum b) const
-{
-	#ifdef SAFE
-		assert(Convert(TNum(a))==a);
-		assert(Convert(b)==b);
-	#endif
-
-	return multiplicationTable[getPairIndex(a, b)];
-}
-
-
-
-// inline bringt hier kaum Zeitvorteil.
-///multipliziert zwei Zahlen
-template <class TNum,class kdefs>
- inline  TNum  
-fast_Ring< TNum, kdefs>::scalarMultiplyRef(const FieldType::ElementType & a, const TNum & b) const
-{
-	#ifdef SAFE
-		assert(Convert(TNum(a))==a);
-		assert(Convert(b)==b);
-	#endif
-
-	return multiplicationTable[getPairIndexByRef(a, b)];
-}
-
-
-
-//-------------------------------scalarmultiply in place-------------------------------------------
-
-
-template <class TNum,class kdefs>
-inline void  
-fast_Ring< TNum, kdefs>::scalarMultiplyInPlace(const FieldType::ElementType 	a,
-												TNum & b ) const
-{
-	#ifdef SAFE
-		assert(Convert(TNum(a))==a);
-		assert(Convert(b)==b);
-	#endif
-	b = multiplicationTable[ getPairIndex(a, b) ];
-}
-
-
-template <class TNum,class kdefs>
-inline void  
-fast_Ring< TNum, kdefs>::scalarMultiplyInPlaceRef(const FieldType::ElementType & a,
-												 TNum &  b 	) const
-{
-	#ifdef SAFE
-		assert(Convert(TNum(a))==a);
-		assert(Convert(b)==b);
-	#endif
-	b = multiplicationTable[ getPairIndexByRef(a, b) ];
-}
-
-//-------------------------------multiply by exponents-------------------------------------------
-
-
-template <class TNum,class kdefs>
-inline TNum const   fast_Ring< TNum, kdefs>::multByExp(const TNum a, const TNum b) const
-{
-	if (a.isZero() || b.isZero() )
-		return TNum::Zero;
-
-	register short res = a.getX()+b.getX();
-	if ( res>=getCharacteristic() )
-		return res-getCharacteristic();
-	return res;
-}
-
-
-
-template <class TNum,class kdefs>
-inline TNum const   fast_Ring< TNum, kdefs>::multByExpRef(const TNum & a, const TNum & b) const
-{
-	if (a.isZero() || b.isZero() )
-		return TNum::Zero;
-
-	register short res = a.getX()+b.getX();
-	if (res>=getCharacteristic())
-		return res-getCharacteristic();
-	return res;
-}
-
-
-
-template <class TNum,class kdefs>
-inline void  fast_Ring< TNum, kdefs>::multByExpInPlace( TNum & a, const TNum  b) const
-{
-	if (a.isZero() || b.isZero() )
-		 a=TNum::Zero;
-
-	register short res = a.getX()+b.getX();
-	if (res>=getCharacteristic())
-		a=res-getCharacteristic();
-	a=res;
-}
-
-
-
-template <class TNum,class kdefs>
-inline void  fast_Ring< TNum, kdefs>::multByExpInPlaceRef( TNum & a, const TNum & b) const
-{
-	if (a.isZero() ||b.isZero())
-		 a=TNum::Zero;
-
-	register unsigned short res = a.getX() + b.getX();
-	if (res>getCharacteristic()-1)
-		a= res-getCharacteristic();
-	return;
-}
-//-------------------------------multiplicative inverse-------------------------------------------
-
-// invers: sollte nur skalare invertieren und nicht zahlen. -
-//  no das ist ja ein superring und kann auch mit basicNumber rechnen :-)
-template <class TNum,class kdefs>
-inline  TNum  fast_Ring< TNum, kdefs>::multInv(const TNum  a) const
-{
-	#ifdef SAFE
-		assert( a==Convert(a) );
-	#endif
-	TNum const &  res = multiplicativeInverseTable[ getSingleIndex( a)];
-	if (res.isNotZero() ) 
-	{
-		return res;
-	}
-	else 
-	{
-		std::cerr << "Multiplicative inverse does not exist!" << std::endl;
-		throw "Multiplicative inverse does not exist!" ;
-	}
-}
-
-// invers: sollte nur skalare invertieren und nicht zahlen.
-template <class TNum,class kdefs>
-inline  TNum  fast_Ring< TNum, kdefs>::multInvRef(const TNum & a) const
-{
-	#ifdef SAFE
-		assert( a==Convert(a) );
-	#endif
-	TNum const &	res = multiplicativeInverseTable[ getSingleIndexByRef( a) ];
-	if (res.isNotZero() ) 
-	{
-		return res;
-	}
-	else 
-	{
-		std::cerr << "Multiplicative inverse does not exist!" << std::endl;
-		throw "Multiplicative inverse does not exist!" ;
-	}
-}
-
-
-
-
-
-
-
-// invers: sollte nur skalare invertieren und nicht zahlen.
-template <class TNum,class kdefs>
-inline void fast_Ring< TNum, kdefs>::multInvInPlace( TNum & a) const
-{
-	#ifdef SAFE
-		assert( a==Convert(a) );
-	#endif
-	TNum const &	res = multiplicativeInverseTable[getSingleIndex( a)];
-	if (res.isNotZero() ) 
-	{
-		a = res;
-	}
-	else 
-	{
-		std::cerr << "Multiplicative inverse does not exist!" << std::endl;
-		throw "Multiplicative inverse does not exist!" ;
-	}
-}
-
-
-
-
-//-------------------------------accMmult-------------------------------------------
-
-
-template <class TNum,class kdefs>
-inline void fast_Ring<TNum,kdefs>::accMult( TNum& a ,const TNum b , const TNum c)  const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-		assert(Convert(c)==c);
-	#endif
-	#ifdef COUNT
-		accMultCount=accMultCount+1;
-	#endif
-	a=additionTable[ getPairIndex (a, multiplicationTable[ getPairIndex(b, c)] ) ];
-}
-
-
-template <class TNum,class kdefs>
-inline void fast_Ring<TNum,kdefs>::accMult( TNum* a ,const TNum b , const TNum c)  const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-		assert(Convert(c)==c);
-	#endif
-	#ifdef COUNT
-		accMultCount=accMultCount+1;
-	#endif
-
-	*a = additionTable[ getPairIndex( *a,multiplicationTable[ getPairIndex(b, c)] ) ];
-}
-
-
-
-template <class TNum,class kdefs>
-inline void fast_Ring<TNum,kdefs>::accMultRef( TNum& a ,const TNum& b , const TNum& c)  const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-		assert(Convert(c)==c);
-	#endif
-	#ifdef COUNT
-		accMultCount=accMultCount+1;
-	#endif
-
-	a=additionTable[ getPairIndexByRef(a, multiplicationTable[ getPairIndex(b, c) ]) ];
-}
-
-
-
-/// Optimierung : Eigenen Überlegungen nach sollte die Multiplikation an dieser Stelle per Tabelle
-/// und die Addition auf der CPU erledigt werden, weil ein Multiplikator fest ist und nur 
-/// der andere variiert  ( characteristic*characteristic mögliche Werte)
-/// Dagegen variieren bei der Addition beide Zahlen, was zu erheblichen Cache misses führen müsste.
-/// Allerdings ist die Laufzeit auf einem Intel-Rechner katastrophal, wenn man die Addition auf
-/// der CPU durchführt. Es gab mal eine Konfiguration, wo die Addition auf der CPU schneller war,
-///  jetzt ist die Laufzeit in etwa gleich,  oder schlechter mit der Addition auf der CPU
-template <class TNum,class kdefs>
-inline void 
-fast_Ring<TNum,kdefs>::accMultSpec( TNum* const a ,const TNum b , const TNum * const c)  const
-{
-	#ifdef SAFE
-		assert(Convert(*a)==*a);
-		assert(Convert(b)==b);
-		assert(Convert(*c)==*c);
-	#endif
-
-	#ifdef COUNT
-		accMultCount=accMultCount+1;
-	#endif 
-
-	*a=additionTable[ getPairIndex(*a, multiplicationTable[ getPairIndex(b, *c)]) ];
-
-	/*
-	#if EPSPRECISION==1
-	
-		register TNum tmp=multiplicationTable[getPairIndex(b, *c)];
-		register short a2=tmp.getX()+a->getX();
-		if (a2>=getCharacteristic())
-			a->setX(a2-getCharacteristic());
-		else
-			a->setX(a2);
-		a2=tmp.getEps()+a->getEps();
-		if (a2>=getCharacteristic())
-			a->setEps(a2-getCharacteristic());
-		else
-			a->setEps(a2);
-	
-	#else
-		//  on Pentiums following code has catastrophic performance: but on hoech its fast
-		int tmp=(*a).getX()+multiplicationTable[getPairIndex(b, *c)].getX();
-		if (tmp>=getCharacteristic())
-			(a)->setX(tmp-getCharacteristic());
-		else
-			(a)->setX(tmp);
-	#endif*/
-
-}
-
-
-template <class TNum,class kdefs>
-inline 		typename fast_Ring<TNum,kdefs>::sqrtInf_t 	fast_Ring<TNum,kdefs>::sqrt	( const TNum a)  const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		
-	#endif
-	assert( a.getEps()==0 );
-	return 	sqrtTable[ a.getX() ];
-}
-
-template <class TNum,class kdefs>
-inline 		typename fast_Ring<TNum,kdefs>::sqrtInf_t		fast_Ring<TNum,kdefs>::sqrtRef	( const TNum &a) const
-{
-	#ifdef SAFE
-		assert(Convert(*a)==*a);
-	#endif
-	assert( a.getEps()==0 );
-	return sqrtTable[ a.getX() ];
-}
-
-
-///accMult assumes, that b is not zero, and 
-template <class TNum,class kdefs>
-inline void fast_Ring<TNum,kdefs>::accMultAddr( TNum* a ,const TNum* b , const TNum* c)  const
-{
-	#ifdef SAFE
-		assert(Convert(a)==a);
-		assert(Convert(b)==b);
-		assert(Convert(c)==c);
-	#endif
-	*a = additionTable[getPairIndex(*a, multiplicationTable[ getPairIndex(*b, *c)]) ];
-}
-
-
-
-/// @todo herausfinden, welchen Datentyp wir nach der %-Operation haben 
-///       und ob es Probleme bei unsigned Datentypen gibt.
-/// @todo vernuenftige Loesung fuer epsPrecision>0.
-/// @todo testen , ob angegebene Charakteristik eine Primzahl ist -
-///		 Merkt man das nicht spaetestens wenn es keinen Erzeuger gibt?
-template <class TNum,class kdefs>
- TNum fast_Ring<TNum,kdefs>::getGenerator()
-{
-	//std::cerr << " getGenerator () " << std::endl;
-
-	if (getEpsPrecision()>0)
-	{
-		std::cerr << " Warning: getGenerator()  is not implemented for epsPrecision>0 !";
-		std::cerr << std::endl;
-
-		return TNum::Zero;
-	}
-	for (int m=1; m<getCharacteristic(); m++)
-	{
-		TNum erzeuger = m;
-		TNum tmp = erzeuger;
-		assert (tmp==erzeuger);
-
-		bool erz=true;
-
-		for (int n=0; n<getCharacteristic()-1; n++)
-		{
-
-			tmp.setX(     (unsigned int ) 
-				        ( (unsigned int )tmp.getX() * (unsigned int )erzeuger.getX() )
-					% getCharacteristic()
-				);
-	
-			if ( (tmp.getX()==erzeuger.getX()) && (n<( getCharacteristic() - 2 )) )
-			{
-				erz=false;
-			}
-		}
-
-		if (erz)
-		{
-			tmp = erzeuger;
-			return erzeuger;
-	
-		}
-	}
-	std::cerr << " Error: kein Erzeuger gefunden !  - da gibt es einen Fehler! " << std::endl;
-	exit(0);
-	return TNum::Zero;
-}
-
-template <class TNum,class kdefs>
- bool fast_Ring<TNum,kdefs>::isGenerator(const TNum & _generator) const
-{
-        TNum tmp = _generator;
-        assert (tmp==_generator);
-
-        bool bIsGenerator=true;
-        for (int n=0; n<getCharacteristic()-1; n++)
-        {
-
-            tmp.setX(     (unsigned int ) 
-                        ( (unsigned int )tmp.getX() * (unsigned int )_generator.getX() )
-                    % getCharacteristic()
-                );
-    
-            if ( (tmp.getX()==_generator.getX()) && (n<( getCharacteristic() - 2 )) )
-            {
-                bIsGenerator = false;
-            }
-        }
-        return bIsGenerator;
-}
-
-
-/** @brief create addition table
-*
-*  @description Initialisiert die Additionstabelle .
-* Es gibt zwei Faelle: epsPrecision==0 und epsPrecision==1
-* Bei epsPrecision =0 sind die Eintraege eindimensional (x) und 
-* fuer epsPrecision==1 zweidimensional (x,eps).
-* 
-* Optimierungsmoeglichkeit:
-* steht wenig cache zur Verfuegung, so kann der Cache-Bedarf um die Haelfte reduziert werden,
-* wenn die Additionstabelle nur Eindimensional angelegt wird und die add-Funktionen 
-* bei epsPrecision==1  (x1,eps1)+(x2,eps2) simulieren. 
-
-*/
-template <class TNum,class kdefs>
- TNum * fast_Ring<TNum, kdefs>::createAdditionTable()
-{
-
-	unsigned short i, j, k , l;  // sollte nicht unb short sein, sondern vom basistyp abhaengen
-
-	TNum * tAdditionTable=0;
-
-	size_t tableSize = getMaxPairIndex() + 1;
-
-	#ifdef DEBUG
-	std::cerr << "createAdditionTable::tableSize = " << tableSize << std::endl;
-	#endif
-
-	tAdditionTable = new TNum[tableSize];
-
-	for (i=0; i<getCharacteristic(); i++)
-		for (j=0; j<((getCharacteristic()-1)*getEpsPrecision())+1; j++)
-			for (k=0; k<getCharacteristic(); k++)
-				for (l=0; l<((getCharacteristic()-1)*getEpsPrecision())+1; l++)
-				{
-					TNum 	z1(i, j);
-					TNum 	z2(k, l);
-					size_t index = getPairIndex(z1, z2);
-					assert(index < 	tableSize && index>=0);
-
-					tAdditionTable[index].setX   (
-										  ( (int)z1.getX() + (int)z2.getX()  )
-										% getCharacteristic() 
-									);
-
-					tAdditionTable[index].setEps ( 
-										  ((int)z1.getEps() + (int)z2.getEps())
-										% getCharacteristic() 
-									);
-				}
-	return tAdditionTable;
-}
-
-
-/// only for epsilon==0
-template <class TNum,class kdefs>
- TNum* fast_Ring<TNum,kdefs>::createFastAdditionTable()
-{
-	TNum * tfastAdditionTable=NULL;
-
-	if (getEpsPrecision()==0)
-	{
-
-		tfastAdditionTable = new TNum[ getCharacteristic()*2 ];
-	
-		for (int m=0; m<getCharacteristic(); m++)
-		{
-			tfastAdditionTable[m]=m;	
-		}
-	
-		for (int m=0; m<getCharacteristic(); m++)
-		{
-			tfastAdditionTable[m + getCharacteristic() ]=m;	
-		}
-	}
-	return tfastAdditionTable;
-}
-
-/// @todo modulo % getCharacteristic() in initAddInv() unnoetig
-template <class TNum,class kdefs>
- TNum* 	fast_Ring<TNum,kdefs>::createAdditiveInverseTable()
-{
-	int i, j; 
-
-	size_t 	tableSize = getMaxSingleIndex() + 1;
-
-	TNum*	tadditiveInverseTable = new TNum[ tableSize ];
-
-	for (i=0; i<getCharacteristic(); i++)
-		for (j=0; j<( ( getCharacteristic()-1 )*getEpsPrecision() )+1; j++)
-		{
-			TNum 	z1(i, j);
-
-			size_t 	index = getSingleIndex( z1); 
-			assert(index<tableSize && index>=0);
-
-			TNum 	z2(	( getCharacteristic() - i) % getCharacteristic(),
-					 (getCharacteristic() - j) % getCharacteristic()    );
-
-			tadditiveInverseTable[ index ] = z2;
-		}
-	return tadditiveInverseTable;
-}
-
-
-
-
-/// creates multiplication table
-template <class TNum,class kdefs>
-TNum * fast_Ring<TNum, kdefs>::createMultiplicationTable()
-{	
-	int i, j, k, l; 
-
-	TNum * tMultiplicationTable = NULL;
-	
-	size_t tableSize = getMaxPairIndex() + 1;
-
-	tMultiplicationTable = new TNum[tableSize];
-
-	for (i=0; i< getCharacteristic(); i++)
-		for (j=0; j<( (getCharacteristic()-1)*getEpsPrecision() )+1; j++)
-			for (k=0; k < getCharacteristic(); k++)
-				for (l=0; l<( (getCharacteristic() - 1)* getEpsPrecision() ) + 1; l++)
-				{
-					TNum 	z1 (i,j);
-					TNum 	z2 (k,l);
-
-					size_t 	index = getPairIndex(z1, z2);
-
-					assert(index < 	tableSize && index>=0 );
-
-					TNum result;
-
-					result.setX  (  	((int) z1.getX() * (int)z2.getX() ) 
-								% getCharacteristic()
-							);
-			
-					result.setEps( (   (int)z1.getX() * (int)z2.getEps() 
-							       + (int)z2.getX() * (int)z1.getEps() 
-						         ) % getCharacteristic()	
-							);
-				
-					if (j==0 && l==0 && i==k )
-					{
-						if (result.getX()==getCharacteristic()-1)
-						{
-							bContainsImagNum_m=true;
-							imagNum_m=z1;
-						}
-					}
-
-					tMultiplicationTable[ index ] = result;
-				}
-
-
-	/*for (i=0; i< getCharacteristic(); i++)
-			for (k=0; k < getCharacteristic(); k++)
-				{
-					TNum 	z1 (i,0);
-					TNum 	z2 (k,0);
-
-					size_t 	index = getPairIndex(z1, z2);
-
-					assert(index < 	tableSize && index>=0 );
-
-					TNum result;
-
-					result.setX  (  	((int) z1.getX() * (int)z2.getX() ) 
-								% getCharacteristic()
-							);
-			
-					assert(tMultiplicationTable[ index ] == result);
-				}*/
-
-	return tMultiplicationTable;
-}
-
-
-/// creates multiplicative inverse table
-/// 
-/// @todo in den Initialisierungsfunktionen die Convert-Funktion nutzen!
-/// @todo initInv überarbeiten!
-template <class TNum,class kdefs>
- TNum* fast_Ring<TNum,kdefs>::createMultiplicativeInverseTable()
-{
-	int i, j, k, l; 
-	
-	size_t tableSize = getMaxSingleIndex() + 1;
-
-	TNum * inverses1 = new TNum[ tableSize ];
-
-	for (i=0; i<getCharacteristic(); i++)
-
-		for (j=0; j<((getCharacteristic()-1)*getEpsPrecision())+1; j++)
-		{
-			TNum 	z1(i, j);
-			size_t 	index = getSingleIndex( z1 );
-
-			assert(index<tableSize && index>=0);
-
-			inverses1[ index ]  = TNum::Zero; 
-
-			for (k=0; k<getCharacteristic(); k++)
-				for (l=0; l<((getCharacteristic()-1)*getEpsPrecision())+1; l++)
-				{
-					TNum 	z2(k, l);
-					TNum 	z;
-					z.setX(  ((int)z1.getX() * (int)z2.getX()) % getCharacteristic()  );
-
-					z.setEps ( (  (int)z1.getX() * (int)z2.getEps() 
-						     + (int)z2.getX() * (int)z1.getEps()  
-						   ) % getCharacteristic()  );
-
-					if ( z == TNum::One )
-					{
-						size_t index_2 = getSingleIndex( z1);
-						assert( index_2<tableSize && index_2 >=0);
-						inverses1 [index_2 ] = z2;
-						break;
-					}
-				}
-		}
-	return inverses1;
-}
-
-
-
-	
-/// @todo is only correct for epsPrecision==0 and does not really belong in fast_Ring class!
-template <class TNum,class kdefs>
- TNum* fast_Ring<TNum,kdefs>::initElementsToExponentsTab(TNum erzeuger)
-{
-	TNum * tElementsToExponentsTab=NULL;
-	
-	size_t tableSize = getMaxSingleIndex() + 1;
-
-	tElementsToExponentsTab = new TNum[tableSize];
-
-	tElementsToExponentsTab[0]=TNum::Zero;
-
-	TNum num=erzeuger;
-
-	for (int i=1; i<getCharacteristic(); i++)
-	{
-		tElementsToExponentsTab[ num.getX() ] = i;
-		num.setX( ( (int)num.getX() * (int)erzeuger.getX() ) % getCharacteristic());
-	}
-	if (num!=erzeuger)
-	{
-		std::cerr << "num " << num << std::endl;
-		std::cerr << "generator " << erzeuger << std::endl;
-		num = erzeuger;
-		for (int i=1; i<getCharacteristic(); i++)
-		{
-			std::cerr << "num " << (int)num.getX() * (int)erzeuger.getX() << std::endl;
-			num.setX( ( (int)num.getX() * (int)erzeuger.getX() ) % getCharacteristic());
-			std::cerr << "num " << num << std::endl << std::endl;
-		}
-
-		assert( num==erzeuger );
-	}
-	return tElementsToExponentsTab;
-}
-
-
-/// @note exponentsToElementTab koennte PerformanceProbleme bereiten, wenn 
-///  intern die Indizierungsfunktnion verwendet wuerde
-template <class TNum,class kdefs>
- TNum* fast_Ring<TNum,kdefs>::initExponentsToElementTab(TNum erzeuger)
-{
-
-	TNum * 	tExponentsToElementTab=NULL;
-	
-	long 	tableSize=0;
-
-	tableSize = getMaxSingleIndex() + 1;
-
-	tExponentsToElementTab = new TNum[tableSize];
-
-	tExponentsToElementTab[0] = TNum::Zero;
-
-	TNum num = erzeuger;
-
-	for (int i=1; i<getCharacteristic(); i++)
-	{
-		//exponentsToElementTab[ TNum::getSingleIndex( i ) ] = num;
-		tExponentsToElementTab[  i  ] = num;
-		num.setX( ( (int)num.getX() * (int)erzeuger.getX() ) % getCharacteristic() );
-	}
-	assert( num==erzeuger );
-	return tExponentsToElementTab;
-}
-
-
-template <class TNum,class kdefs>
-typename fast_Ring<TNum,kdefs>::FieldType::ElementType* fast_Ring<TNum,kdefs>::createModuloTable() 
-{
-	ScalarType * tModuloTable=NULL;
-	
-
-	 
-	 //moduloTableSize_m = 9*characteristic*characteristic+characteristic;
-	// 
-	size_t 	_characteristic=characteristic;
-	moduloTableSize_m = 15*_characteristic*_characteristic+_characteristic;
-	tModuloTable= new ScalarType[ moduloTableSize_m ];
-
-	long currPos=0;
-	while( currPos < moduloTableSize_m )
-	{
-		for (long j=0; j<characteristic;j++  )
-		{
-			tModuloTable[ currPos ] = j;
-			currPos++;
-		}
-	}
-	
-	return tModuloTable;
-}
-
-
-template <class TNum,class kdefs>
-inline int  fast_Ring<TNum,kdefs>::getLookupModuloTableSize( ) const
-{
-	return moduloTableSize_m;
-}
-
-
-template <class TNum,class kdefs>
-inline typename fast_Ring<TNum,kdefs>::FieldType::ElementType  fast_Ring<TNum,kdefs>::lookupModuloTable(int convertee) const
-{
-	#ifdef SAFE
-		//if (convertee<0 )
-		//	std::cerr << "error: convertee = "<<convertee << std::endl;
-		//assert(convertee>=0 );
-		//assert(convertee<moduloTableSize_m);
-		//assert(convertee>=0 && convertee<moduloTableSize_m);
-	#endif
-	
-	if (convertee>=moduloTableSize_m || convertee<0  )
-	{
-		//std::cerr << "convertee " << convertee << endl;
-		return ConvertScalar(convertee);
-	}
-	//assert(convertee>=0 && convertee<moduloTableSize_m);
-	return moduloTable[convertee];
-}
-
- 
-template <class TNum,class kdefs>
-typename fast_Ring<TNum,kdefs>::sqrtInf_t* fast_Ring<TNum,kdefs>::createSqrtTable()
-{
-
-	typename fast_Ring<TNum,kdefs>::sqrtInf_t * 	tSqrtTable=NULL;
-	
-	long 	tableSize=0;
-
-	tableSize = getMaxSingleIndex() + 1;
-
-	tSqrtTable = new typename fast_Ring<TNum,kdefs>::sqrtInf_t[tableSize];
-
-	typename fast_Ring<TNum,kdefs>::sqrtInf_t entry(0,TNum::Zero);
-
-	for (int i=0; i<getCharacteristic(); i++)
-	{
-		tSqrtTable[ i ] = entry;
-	}
-
-	for (int i=0; i<getCharacteristic(); i++)
-	{
-		int res= (i*i) % getCharacteristic();
-		if (tSqrtTable[  res  ].solutions==0)
-			tSqrtTable[  res  ].sqrt =TNum(i);
-		else
-		{
-			assert(  getCharacteristic()-i ==tSqrtTable[  res  ].sqrt.getX() );
-		}
-		tSqrtTable[  res  ].solutions ++;
-		
-	}
-
-	for (int i=0; i<getCharacteristic(); i++)
-	{
-		assert(	tSqrtTable[  i  ].solutions==0 ||	
-			tSqrtTable[  i  ].solutions==2   ||  tSqrtTable[  i  ].sqrt.getX()==0 || getCharacteristic()==2 );
-		
-	//	std::cerr<< "tSqrtTable["<< i <<"    ].sqrt.getX()" << (int)tSqrtTable[  i  ].sqrt.getX() << std::endl;
-		if (tSqrtTable[  i  ].solutions>0)
-			assert(	(tSqrtTable[  i  ].sqrt.getX() *	tSqrtTable[  i  ].sqrt.getX() ) % getCharacteristic() == i	 );
-		assert(	tSqrtTable[  i  ].sqrt.getEps()==0);
-	}
- 
-	return tSqrtTable;
-}
-
-
-
-
-//----------------------Power---------------------------------------------------
-
-template <class TNum,class kdefs>
-inline TNum fast_Ring<TNum,kdefs>::pow(const TNum x,unsigned int exp) const
-{
-	#ifdef SAFE
-		assert(exp>=0);
-	#endif
-
-	
-	if (exp==1)
-		return x;
-	if (exp==0)
-		return TNum::One;
-	
-	
-	TNum erg = x;
-	for (; exp >1; exp--)
-	{
-		multiplyInPlaceRef( erg, x ) ;			
-	}
-	return erg;
-}
-
-
-
-template <class TNum,class kdefs>
-inline void fast_Ring<TNum,kdefs>::powInPlace( TNum & x, unsigned int exp) const
-{
-	#ifdef SAFE
-		assert(exp>=0);
-	#endif
-
-	
-	if (exp==1)
-		return ;
-	if (exp==0)
-		x = TNum::One;
-	
-	TNum tmp = x;
-	for (; exp >1; exp--)
-	{
-		multiplyInPlaceRef( x, tmp ) ;			
-	}
-	return;
-}
-
-
-//----------------------Index---------------------------------------------------
-
-template <class TNum,class kdefs>		
-inline  size_t 	fast_Ring<TNum,kdefs>::getMaxSingleIndex() const
-{ 
-	return TNum::getMaxSingleIndex( getCharacteristic());
-}
-
-
-
-template <class TNum,class kdefs>		
-inline  size_t 	fast_Ring<TNum,kdefs>::getMaxPairIndex() const
-{ 
-	return TNum::getMaxPairIndex( getCharacteristic() );
-}
-
-
-
-template <class TNum,class kdefs>		
-inline  size_t 	fast_Ring<TNum,kdefs>::getSingleIndex(const TNum z1) const
-{ 
-	// 1. reicht das, wenn ich hier TNum::getPairIndex(z1,z2) einsetze,
-	// oder muss ich ueberall TNum::getxxxIndex verwenden damit das Programm schnell laeuft?
-	return TNum::getSingleIndex(z1, getCharacteristic());
-}
-
-template <class TNum,class kdefs>		
-inline  size_t 	fast_Ring<TNum,kdefs>::getSingleIndexByRef(const TNum &z1) const
-{ 
-	return TNum::getSingleIndexByRef(z1, getCharacteristicRef());
-}
-
-template <class TNum,class kdefs>
-inline  size_t 	fast_Ring<TNum,kdefs>::getPairIndex(const TNum z1, const TNum z2)  const
-{ 
-	return TNum::getPairIndex(z1, z2, getCharacteristic() );			
-}
-
-
-template <class TNum,class kdefs>
-inline  size_t 	fast_Ring<TNum,kdefs>::getPairIndexByRef(const TNum & z1, const TNum & z2) const
-{ 
-	return   TNum::getPairIndexByRef(z1, z2, getCharacteristicRef() ) ;
-}
-
-
-
diff --git a/sandbox/hurwitz.kroeker/src/fast_Ring.h b/sandbox/hurwitz.kroeker/src/fast_Ring.h
deleted file mode 100755
index 02d6b55..0000000
--- a/sandbox/hurwitz.kroeker/src/fast_Ring.h
+++ /dev/null
@@ -1,428 +0,0 @@
-
-#ifndef FAST_RING_H
-#define FAST_RING_H
-
-
-#if _MSC_VER > 1000
-#pragma once
-#endif // _MSC_VER > 1000
-
-
-#include "fastNumber.h"
-
-
-
-
-/** @file fast_Ring.h
-*
-* @brief (optimized) implementation of a finite field F_q and finite ring F_q[epsilon] template for small characteristic.<br>
-
-        Characteristic of the field/ring may be defined at compile time.
-	*TODO Ring mit Characteristic = 0!
-	
-*/
-
-/** @file fast_Ring.cpp
-*
-* @brief 
-*/
-
-using namespace std;
-
-// zum Design:
-// bei Koerper fehlt istElement(zahl)
-// generic_Ring sollte sowas bieten, wie getZahl
-
-
-/**
-* @brief Implements some fast basic operations for elemens of a ring  F_q[epsilon] or field F_q with small characteristic; <br>
-	 For all operations the user must be sure that the operators are regular represantants of ring elements, in doubt by calling 
-	 the Convert() function. Currently all represantant values must lie between 0 and (characteristic-1).
-	 Allowed 'eps' precisions are 0 (is a field) and 1 (is a ring) <br>
-         Parametrized with element Type (TNum) and characteristic of the field the ring is based on during compile time
-
- Main idea: table lookup instead of computation. 
-For big characteristics this method costs performance, because the operation lookup tables does not fit in L1 or L2 cache
-But for small characteristics it works very well.
-
-To avoid copying data, functions with reference parameters were implemented, because it is impossible to enforce inlining.
-But that costs implementation overhead and is dangerous, because is is possible to pass a reference to a temporary variable.
-and woult result in an error.
-*
-* Die Schnelligkeit der Berechnungen beruht auf 
-* Verwendung von Operationstabellen und von der Annahme, dass alle Funktionsaufrufe mit gültigen Parametern ausgeführt werden.
-* Die Operationstabellen sind so ausgelegt, dass mit Hilfe von Bit Shift Operationen das Ergebnis
-* einer Rechenoperation abgelesen werden kann:
-* statt 
-*
-* ArrayIndex(a,b)=a*charakteristik+b  
-*
-* ArrayIndex(a,b)=a*Zweierpotenz+b benutzt wird.; Zweierpotenz>=charakteristik,
-* Somit kann die Indexfunktion mit Bit Schifts und bitweisem 'OR'  berechnet werden
-*  Der Nachteil ist, dass mehr Speicherplatz, als benötigt belegt wird.
-*
-* Die Berechnungen werden wieder langsamer, wenn die Tabellen nicht in den Cache passen.
-* Bei Charakteristik 29 und dem Zahlentype 'number_eps1' beträgt der Speicherplatzbedarf
-* 29^4*2 Bytes * 2 Tabellen (Multiplikation, Addition) = 4 MByte
-* und bei Charakteristik 23 1119364 = 1 MByte
-*
-*@note Komisch, dass die 23-er Berechnung nicht wesentlich schneller ist  - wieso sollte sie? es gibt nur 1 strudelgroesse weniger!
-*
-* @note in the optimized and error-free version it is not tested, if an operation result is really a legal ring/field representative.
-* Moreover, in a correct frommer algorithm implementation this test is not neccessary.
-*
-*
-* @todo multiplyOnCPU einfuehren bzw multiplyByHand
-*
-* @todo Idee: shift index bei generischer Version - hätte vielleicht Vorteile, da schneller addiert werden kann. 
-* Hm, warum wird die Optimierte Version ohne Addition nicht schneller? Schliesslich wird der Platz für den Pointer
-*  auf die Additionstabelle frei.
-
-
-@todo ueberpruefen, ob man nicht ohne die funktionen mit parametern 'passed by reference' auskommen kann,
-d.h. ob dies nicht wesentlich die performance verschlechtert, und wie man bei 'pass by value'-parametern 
-und Rückgabewerten unnötiges Kopieren verhindern kann.
-
-\ingroup Algebra
-\ingroup FieldRing
-
-
-*/
-template <class TNum, class kdefs>
-class fast_Ring 
-{
-public:
-	typedef 	struct sqrtInf 
-			{
-				short solutions;
-				TNum	sqrt;
-				sqrtInf(short _sol,TNum _sqrt): solutions(_sol), sqrt(_sqrt)
-				{ }
-			sqrtInf(): solutions(0), sqrt(TNum::Zero)
-				{ }
-	} sqrtInf_t;
-
-
-	
-
-	typedef 	TNum 					ElementType;
-
-	typedef 	fast_Ring< TNum,kdefs  >		FieldType;
-
-	typedef 	typename FieldType::ElementType		ScalarType;
-
-
-
-private:
-
-	const unsigned short characteristic;
-
-	long 	moduloTableSize_m;
-
-	bool  bContainsImagNum_m;
-
-	
-
-	/// @todo Variable umbenenen in epsPrecision.
-	const unsigned short epsilon;
-	
-	TNum 	imagNum_m;///@todo sollte eigentlich 'const' sein
-
-	const TNum 	generator;
-	const TNum* 	elementsToExponentsTab;
-	const TNum* 	exponentsToElementTab;
-
-	const TNum* 	additiveInverseTable;
-	const TNum*  	multiplicationTable;
-	const TNum*  	additionTable;
-	const TNum*  	multiplicativeInverseTable;
-	const TNum* 	fastAdditionTable;
-
-	const ScalarType * moduloTable;
-	const sqrtInf_t* sqrtTable;
-
-
-protected:
-	inline void	init() ;
-
- public:
-	inline TNum getZero() const {  return TNum::Zero; };
-
-    inline  TNum getOne() const {  return TNum::One; };
-    
-    
-	/// containsImag  wird  in  createMultiplicationTable() initialisiert
-	bool 		containsImagNum()	const		{	return 	bContainsImagNum_m;	}
-
-	/// imagNum_m	 wird  in  createMultiplicationTable() initialisiert
-	TNum 		getImagNum()	const		{	assert(containsImagNum() );	return 	imagNum_m;	}
-
-
-	bool 		wellDefined();
-
-	/// @todo alternativ Field asls const Membervariable.
-	inline const FieldType * getField() const
-	{
-		return this;
-	}
-
-	inline const FieldType & getFieldRef() const
-	{
-		return *this;
-	}
-
-	/** @name Constructors / Destructors
-	 @{ */
-		fast_Ring(unsigned short _characteristic, unsigned short epsPrec); 
-
-        fast_Ring(unsigned short _characteristic, unsigned short epsPrec, short generator ); 
-		
-		~fast_Ring();
-	/** @} */
-	
-
-	/** @name properties
-	 @{ */
-
-		inline unsigned short  getCharacteristic() const	{	return characteristic;	}
-
-        inline unsigned short  getCardinality() const    
-        {
-              assert(epsilon==0);
-              return characteristic;  
-        }
-
-		inline const  unsigned short & getCharacteristicRef() const	{	return characteristic;	}
-	
-		inline unsigned short  getEpsPrecision() const 		{	return epsilon;		}
-
-		inline void  setEpsPrecision(int epsPrecision) const 		
-		{
-			assert(epsPrecision<=epsilon);
-			//if (epsPrecision<2)
-			//return epsilon;		
-			return;
-		}
-
-	/** @} */
-
-	
-	/** @name safety
-	 @{ */
-		inline bool 	 isValid(TNum a ) const		{ assert(a ==Convert(a) );	return true;	}
-
-        bool isGenerator(const TNum & _generator) const;
-	
-/** @} */
-	//-----------Additionsfunktionen
-	
-
-	/** @name add
-         * @{ */
-		inline 		TNum 	add		( const TNum a,	const  TNum b) 	const;	
-		inline 		TNum	addRef	( const TNum &a,const  TNum& b) const;
-	/** @} */
-
-	/** @name add in place
-	 @{ */
-		inline void	addInPlace   		(TNum& a, const TNum  b) 	const;
-		inline void	addInPlaceRef		(TNum& a, const TNum & b) 	const;
- 	/** @} */
-
-	//-----------Multiplikationsfunktionen
-
-	/** @name additive inverse
-	 @{ */
-		inline  TNum		addInv	 ( const TNum   a ) const;
-		inline  TNum		addInvRef( const TNum & a ) const;
-
-		inline  void		addInvInPlace(  TNum & a ) const;
-	/** @} */
-
-	/** @name accMult
-	 @{ */
-		inline void 	accMult( TNum& a ,const TNum b , const TNum c)  const;
-		inline void 	accMultRef( TNum& a ,const TNum& b , const TNum& c)  const;
-
-		inline void 	accMult( TNum* a ,const TNum b , const TNum c)  const;
-		inline void 	accMultAddr( TNum* a ,const TNum* b , const TNum* c) const;
-
-		inline void 	accMultSpec( TNum* const a ,const TNum b , const TNum * const c) const;
-	
-	/** @} */
-
-	/** @name multiplication
-	 @{ */
-		inline TNum    		multiply(const TNum a, const TNum b) const;
-		inline TNum 		multiplyRef(const TNum& a, const TNum& b) const;
-
-	/** @} */
-
-
-	/** @name multiply in place
-         * @{ */
-		inline void 	multiplyInPlace( TNum& a, const TNum b) const;
-		inline void 	multiplyInPlaceRef( TNum& a, const TNum& b) const;
-	/** @} */
-
-
-	/** @name scalar multiplication
-	 @{ */
-		inline TNum    		scalarMultiply   (const FieldType::ElementType a, const TNum b) const;
-		inline TNum 		scalarMultiplyRef(const FieldType::ElementType& a, const TNum& b) const;
-
-	/** @} */
-
-
-	/** @name scalar multiply in place
-         * @{ */
-		inline void 	scalarMultiplyInPlace   (const FieldType::ElementType a,  TNum & b) const;
-		inline void 	scalarMultiplyInPlaceRef(const FieldType::ElementType& a,  TNum& b) const;
-	/** @} */
-
-	/** @name multiplication by Exponents
-	 @{ */
-		inline TNum const   	multByExp   (const TNum a, const TNum b) const;
-		inline TNum const  	multByExpRef(const TNum & a, const TNum & b) const;
-		inline void  		multByExpInPlace( TNum & a, const TNum  b) const;
-		inline void  		multByExpInPlaceRef( TNum & a, const TNum & b) const;
-	/** @} */
-
-
-	/** @name multiplicative inverse
-         * @{ */
-		inline  TNum  		multInv   (const TNum a) const;
-		inline  TNum 		multInvRef(const TNum &a) const;
-		inline void		multInvInPlace( TNum &a) const;
-	/** @} */
-
-
-	/** @name power
-         * @{ */
-		inline TNum 	pow	  ( TNum const a ,unsigned int exp) const;
-		inline void 	powInPlace( TNum &     a ,unsigned int exp) const;
-	/** @} */
-
-	/** @name sqrd
-         * @{ */
-		inline 		sqrtInf 	sqrt	( const TNum a)  const;	
-		inline 		sqrtInf		sqrtRef	( const TNum &a) const;
-	/** @} */
-
-	/** @name Conversion
-	 @{ */
-
-        // todo: es fehlt eigentlich RepToInt...
-
-        inline int  repToInt(const  TNum &)    const;
-
-		inline  typename FieldType::ElementType  lookupModuloTable(int convertee) const;
-
-		inline int getLookupModuloTableSize() const;
-
-		template <class TConvNum >
-		inline TNum	Convert(const TConvNum a) const;
-
-		//template <class TConvNum =double >
-		///@TODO Convert eventuell umbenennen ConvertScalarToRingElement 
-		inline TNum	Convert(const double a) const;
-		///@TODO Convert eventuell umbenennen ConvertScalarToRingElement 
-		inline TNum	Convert(const int a) const;
-        inline TNum Convert(const short a) const;
-        inline  TNum Convert(const unsigned long  a) const;
-
-		template <class TConvNum >
-		inline void	ConvertInPlace( TConvNum & a) const;
-		
-		///@TODO einfuehren ConvertScalarToFieldElement 
-		inline int	ConvertScalar(const int a) const;
-
-		inline int 	ConvertScalarSpec(const int  a) const;
-		
-		inline int 	FastConvertScalar(const int  a) const;
-
-        inline int elemToGeneratorExponent(const TNum z1) const
-        {
-            return ( elementsToExponentsTab[z1.getX() ] ).getX() ;
-        }
-
-        // todo: ueberarbeiten!!!
-        inline int generatorExponentToElem(const TNum z1) const
-        {
-            return ( exponentsToElementTab[ z1.getX() ] ).getX() ;
-        }
-
-      
-	/** @} */
-
-	/** @name Table index computation
-	 @{ */
-		inline  size_t 	getMaxSingleIndex() const;
-		inline  size_t 	getMaxPairIndex() const;
-		inline  size_t 	getSingleIndex(const TNum z1) const;
-		inline  size_t 	getSingleIndexByRef(const TNum &z1) const;
-
-		inline  size_t 	getPairIndexByRef(const TNum &z1, const TNum& z2) const;
-		inline  size_t 	getPairIndex(const TNum z1, const TNum z2) const;
-	/** @} */
-
-	/// only for the case, that table pointers are static
-	//inline static void  clear() { }; /* gibt den Index in der Multiplikations- bzw. Additionstabelle zurck */
-
-
- protected:
-	
-	TNum* 	createAdditionTable(); /* initialisiert Additionstafel */
-
-   
-	TNum*	createMultiplicationTable(); /* initialisiert Multiplikationstafel */	
-
-	TNum* 	createSubtractionTable(); /* initialisiert SubtraAdditionstafel */
-	TNum* 	createAdditiveInverseTable();
-	
-	TNum* 	createMultiplicativeInverseTable(); /* initialisiert Tabelle fr multiplikative Inverse */
-
-	/// Returns a generator of the Ring\{0} if exists, otherwise TNum::Zero
- 	TNum 		getGenerator();
-
-	TNum* 	initElementsToExponentsTab(TNum erzeuger);
-	TNum* 	initExponentsToElementTab(TNum erzeuger);
-
-	TNum* 	createFastAdditionTable();
-
-	typename FieldType::ElementType* 	createModuloTable(); /* initialisiert Additionstafel */
-
-	sqrtInf_t* createSqrtTable();
-
-};
-
-
-
-/// @todo Optimization: Addition with tables is faster on a intel Processor for epsprecision 1. 0 ?
-/// Auch auf hoech ist auf einmal die Addition mit Tabellen schneller... 
-
-/// @todo diese 'assert(Convert(a)==a)' können wieder raus, wenn ein TNum nur über den Ring->convert(int,int) erzeugt wird
-/// @todo den !=NULL-Test fuer die Tabellen braucht man eingentlich nicht - das wuerde bei einem valgrind-Lauf sofort auffliegen
-
-/*
-template <class TNum>
-inline int generic_Ring<TNum >::ConvertScalar(const int a) const
-{
-	int res = a;
-	while (res<0)
-	{
-		res += kdefs::charakteristik;
-	}
-	if ( res >= kdefs::charakteristik ) 
-	{	
-		res %= kdefs::charakteristik;
-	}
-	return res;
-}*/
-
-
-
-
-	#include "fast_Ring.cpp"
-
-#endif
diff --git a/sandbox/hurwitz.kroeker/src/float/Makefile.am b/sandbox/hurwitz.kroeker/src/float/Makefile.am
deleted file mode 100644
index 91c295f..0000000
--- a/sandbox/hurwitz.kroeker/src/float/Makefile.am
+++ /dev/null
@@ -1,192 +0,0 @@
-#############################################################################
-##
-#W Makefile.am                                              Laurent Bartholdi
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2007, Laurent Bartholdi
-##
-#############################################################################
-##
-##  This compiles the module polroots, and creates archives
-##
-#############################################################################
-ACLOCAL_AMFLAGS = -I m4
-
-
-GAC=@GAC@
-GAP=@GAPPROG@
-LOCALBIN=bin/@TARGET@
-EXTERN=$(CURDIR)/bin/@TARGET@/extern
-GACFLAGS=@GACFLAGS@ -p -g @GAC_stack_protector_flag@
-GACPP=bin/@TARGET@/gac++
-MPFRLIB=mpfr-3.1.0
-MPFILIB=mpfi-1.5
-MPCLIB=mpc-0.9
-FPLLLLIB=libfplll-3.1.3
-CXSCLIB=cxsc-2-5-1
-
-.PHONY: all distribute doc clean mrproper wwwdir checkblocks \
-	lib mpfrlib mpfilib mpclib fpllllib cxsclib  
-
-all: @LIB_TARGET@ @DLL_TARGET@
-
-lib: mpfrlib mpfilib mpclib fpllllib cxsclib
-
-
-
-extern/$(MPFRLIB).tar.bz2: 
-	echo "I can't find $(MPFRLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www.mpfr.org/$(MPFRLIB)/$(MPFRLIB).tar.bz2 )
-
-extern/$(MPFILIB).tar.bz2: 
-	echo "I can't find $(MPFILIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  https://gforge.inria.fr/frs/download.php/27345/mpfi-1.5.tar.bz2   )
-
-extern/$(MPCLIB).tar.gz: 
-	echo "I can't find $(MPCLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www.multiprecision.org/mpc/download/$(MPCLIB).tar.gz  )
-
-extern/$(CXSCLIB).tar.gz: 
-	echo "I can't find $(CXSCLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www2.math.uni-wuppertal.de/~xsc/xsc/cxsc/$(CXSCLIB).tar.gz  )
-
-extern/$(FPLLLLIB).tar.gz: 
-	echo "I can't find $(FPLLLLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://perso.ens-lyon.fr/xavier.pujol/fplll/$(FPLLLLIB).tar.gz  )
-
-
-mpfrlib: extern/$(MPFRLIB).tar.bz2
-	if ! test -r $(EXTERN)/include/mpfr.h; then \
-	    cd extern && \
-	    tar -x -f $(MPFRLIB).tar.bz2 -j && \
-	    cd $(MPFRLIB) && \
-	    ./configure @CONFIGUREPARAMS@ @WITHGMP@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-mpfilib: @MPFRDEPEND@ extern/$(MPFILIB).tar.bz2
-	if ! test -r $(EXTERN)/include/mpfi.h; then \
-	    cd extern && \
-	    tar -x -f $(MPFILIB).tar.bz2 -j && \
-	    cd $(MPFILIB) && \
-	    ./configure  @CONFIGUREPARAMS@ @WITHGMP@ @WITHMPFR@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-mpclib: @MPFRDEPEND@ extern/$(MPCLIB).tar.gz
-	if ! test -r $(EXTERN)/include/mpc.h; then \
-	    cd extern && \
-	    tar -x -f $(MPCLIB).tar.gz -z && \
-	    cd $(MPCLIB) && \
-	    ./configure  @CONFIGUREPARAMS@  @WITHGMP@ @WITHMPFR@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-fpllllib: @MPFRDEPEND@ extern/$(FPLLLLIB).tar.gz
-	if ! test -r $(EXTERN)/include/fplll.h; then \
-	    cd extern && \
-	    tar -x -f $(FPLLLLIB).tar.gz -z && \
-	    cd $(FPLLLLIB) && \
-	    ./configure  @CONFIGUREPARAMS@ CPPFLAGS="\"@INCLGMP@ @INCLMPFR@ $(CPPFLAGS)\"" LDFLAGS="\"@LINKGMP@ @LINKMPFR@ $(LDFLAGS)\"" --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-
-cxsclib: extern/$(CXSCLIB).tar.gz
-	mkdir -p $(EXTERN)
-	rm -f $(EXTERN)/cxsc
-	ln -s . $(EXTERN)/cxsc
-# a dirty hack: we'll pretend our home directory
-# is $(EXTERN), and the installation will go into $(EXTERN)/cxsc
-	if ! test -r $(EXTERN)/include/real.hpp; then \
-	    cd extern && \
-	    tar -x -f $(CXSCLIB).tar.gz -z && \
-	    cp configure.cxsc.ac $(CXSCLIB) && \    
-	    mkdir $(CXSCLIB)/cnf && \
-	    cp -R cnf/ $(CXSCLIB)/ && \
-	    cp aclocal.m4 $(CXSCLIB)/ && \
-        cp -R m4/  $(CXSCLIB)/ && \
-	    cd $(CXSCLIB) && \
-	    cp install_cxsc.in install_cxsc.in.template && \
-	    sed -e 's/-mfpmath=sse/@cxsc_mfpmath_flag@/g' < install_cxsc.in.template > install_cxsc.in && \
-   	    ./configure && \
-	    (echo "yes"; for i in 1 2 3 4 5 6 7 8 9 10; do echo ""; done) | \
-		HOME=$(EXTERN) ./install_cxsc; \
-	fi
-
-distribute: doc wwwdir doc tarballs
-	rsync -arvp --delete www/ laurent@elanpc00.uni-math.gwdg.de:public_html/Float/
-
-$(LOCALBIN):
-	mkdir -p $(LOCALBIN)
-
-$(GACPP):
-	sed -e 's/"gcc"/"g++"/g' -e 's/\([* ]\.\)c/\1C/g' < $(GAC) > $(GACPP)
-	chmod a+x $(GACPP)
-
-$(LOCALBIN)/%.o: src/%.C $(GACPP)
-	$(GACPP) $(GACFLAGS) -d -o $@ -c $<
-
-$(LOCALBIN)/%.o: src/%.c
-	$(GAC) $(GACFLAGS) -d -o $@ -c $<
-
-$(LOCALBIN)/mp_float.so: @MP_FLOAT_O@ $(GACPP)
-	$(GACPP) $(GACFLAGS) -d -o $@ @MP_FLOAT_O@ @MP_FLOAT_LIB@
-
-$(LOCALBIN)/cxsc_float.so: @CXSC_FLOAT_O@ $(GACPP)
-	$(GACPP) $(GACFLAGS) -d -o $@ @CXSC_FLOAT_O@ @CXSC_FLOAT_LIB@
-
-$(LOCALBIN)/mp_float.o: src/mp_float.c src/mp_float.h
-
-$(LOCALBIN)/mpfr.o: src/mpfr.c src/mp_float.h
-
-$(LOCALBIN)/mpfi.o: src/mpfi.c src/mp_float.h
-
-$(LOCALBIN)/mpc.o: src/mpc.c src/mp_float.h
-
-$(LOCALBIN)/fplll.o: src/fplll.C
-
-$(LOCALBIN)/mp_poly.o: src/cpoly.C src/mp_poly.C
-
-$(LOCALBIN)/cxsc_poly.o: src/cpoly.C src/cxsc_poly.C src/cxsc_float.h
-
-clean:
-	rm -rf .version $(LOCALBIN) `find doc -type l`
-
-configure: Makefile.am configure.ac
-	(  autoconf; automake; )
-
-mrproper: clean
-	rm Makefile
-
-.version: PackageInfo.g
-	grep '^Version :=' $< | awk -F'"' '{print $$2}' > $@
-
-wwwdir: .version tarballs
-	mkdir -p www
-	rm -f `find www -type l`
-	cp README www/README.float
-	cp PackageInfo.g www/PackageInfo.g
-	cp doc/chap0.html www/index.html
-	ln -s float-`cat .version`.tar.gz www/float.tar.gz
-	cp doc/manual.pdf www/manual.pdf
-	(cd doc; for i in *.html; do cp $$i ../www/$$i; done)
-	cp doc/manual.css www/manual.css
-
-doc: doc/chap0.html
-
-doc/chap0.html: doc/float.xml lib/float.gd
-	echo 'LoadPackage("float"); MAKEDOC@Float();' | $(GAP)
-
-checkblocks:
-	grep '<#GAPDoc' lib/*.g[di] | awk -F'"' '{print $$2}' | sort > @@-blocks
-	grep '<#Include' doc/float.xml | awk -F'"' '{print $$2}' | sort > @@-in
-	comm -3 @@-blocks @@-in
-	rm @@-blocks @@-in
-
-tarballs: .version doc
-	mkdir -p www
-	tar cfz www/float-`cat .version`.tar.gz --exclude '*~' --exclude sandbox --exclude bin --exclude www --exclude CVS --exclude .version --exclude cnf/autom4te.cache --exclude 'Makefile*' --exclude config.log --exclude 'extern/*-[0-9]*' -C .. float
-
-#E Makefile . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/src/float/Makefile.cxsc b/sandbox/hurwitz.kroeker/src/float/Makefile.cxsc
deleted file mode 100644
index 1aff836..0000000
--- a/sandbox/hurwitz.kroeker/src/float/Makefile.cxsc
+++ /dev/null
@@ -1,501 +0,0 @@
-#!/bin/sh
-#
-# This file is the Makefile for the C-XSC library
-# ===============================================
-#
-##
-##  CXSC is a C++ library for eXtended Scientific Computing
-##
-##  Copyright (C) 1990-2000 Institut fuer Angewandte Mathematik,
-##                          Universitaet Karlsruhe, Germany
-##            (C) 2000-2011 Wiss. Rechnen/Softwaretechnologie
-##                          Universitaet Wuppertal, Germany
-##
-##  This library is free software; you can redistribute it and/or
-##  modify it under the terms of the GNU Library General Public
-##  License as published by the Free Software Foundation; either
-##  version 2 of the License, or (at your option) any later version.
-##
-##  This library is distributed in the hope that it will be useful,
-##  but WITHOUT ANY WARRANTY; without even the implied warranty of
-##  MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU
-##  Library General Public License for more details.
-##
-##  You should have received a copy of the GNU Library General Public
-##  License along with this library; if not, write to the Free
-##  Foundation, Inc., 59 Temple Place, Suite 330, Boston, MA  02111-1307  USA
-##
-
-PREFIX=/Users/laurent/jakob/4.0/pkg/float/bin/powerpc-apple-darwin8.11.0-cc-default32/extern/cxsc
-VERSION=2
-PATCHLEVEL=5
-SUBLEVEL=1
-RELEASE=2.5.1
-PKGNAME=BUWcxsc
-CC=gcc
-CCOPTS=-Wall  -msse2
-CCOPTIMIZE=-O3 -fno-strict-aliasing
-CXX=g++
-CXXOPTS=-Wall  -msse2
-CXXOPTIMIZE=-O3 -fno-strict-aliasing
-DEPENDOPT=-MM
-LIBS=-lcxsc
-COMPILER=gnu
-GINSTALL=/usr/bin/install
-SHARED=-dynamiclib -Wl,-single_module
-FPIC=-fPIC
-UNAME_SYSTEM=Darwin_powerpc
-LINKERPATH=-Wl,-R/Users/laurent/jakob/4.0/pkg/float/bin/powerpc-apple-darwin8.11.0-cc-default32/extern/cxsc/lib
-BIT=
-ASM=
-LINKEROPTDYNLIBNAME=
-AR=ar
-RANLIB=ranlib
-INSTALL=/usr/bin/install -m 644
-INSTALLEXE=/usr/bin/install -m 755
-STRIP=strip
-INSTDIR=/usr/bin/install -d
-datadir = @datadir@
-sysconfdir = @sysconfdir@
-sharedstatedir = @sharedstatedir@
-localstatedir = @localstatedir@
-libdir = @libdir@
-infodir = @infodir@
-mandir = @mandir@
-includedir = @includedir@
-oldincludedir = /usr/include
-pkgdatadir = $(datadir)/@PACKAGE@
-pkglibdir = $(libdir)/@PACKAGE@
-pkgincludedir = $(includedir)/@PACKAGE@
-top_builddir = .
-
-ACLOCAL = @ACLOCAL@
-AUTOCONF = @AUTOCONF@
-AUTOMAKE = @AUTOMAKE@
-AUTOHEADER = @AUTOHEADER@
-
-am__cd = CDPATH="$${ZSH_VERSION+.}$(PATH_SEPARATOR)" && cd
-INSTALL = @INSTALL@
-INSTALL_PROGRAM = @INSTALL_PROGRAM@
-INSTALL_DATA = @INSTALL_DATA@
-install_sh_DATA = $(install_sh) -c -m 644
-install_sh_PROGRAM = $(install_sh) -c
-install_sh_SCRIPT = $(install_sh) -c
-INSTALL_SCRIPT = @INSTALL_SCRIPT@
-INSTALL_HEADER = $(INSTALL_DATA)
-transform = @program_transform_name@
-NORMAL_INSTALL = :
-PRE_INSTALL = :
-POST_INSTALL = :
-NORMAL_UNINSTALL = :
-PRE_UNINSTALL = :
-POST_UNINSTALL = :
-host_alias = @host_alias@
-host_triplet = @host@
-
-EXEEXT = @EXEEXT@
-OBJEXT = @OBJEXT@
-PATH_SEPARATOR = @PATH_SEPARATOR@
-AMTAR = @AMTAR@
-AWK = @AWK@
-CC = @CC@
-CFLAGS = @CFLAGS@
-CONFIGUREPARAMS = @CONFIGUREPARAMS@
-CXX = @CXX@
-DEPDIR = @DEPDIR@
-DLL_TARGET = @DLL_TARGET@
-GAPDIR = @GAPDIR@
-GETBIN = @GETBIN@
-INSTALL_STRIP_PROGRAM = @INSTALL_STRIP_PROGRAM@
-LIB_TARGET = @LIB_TARGET@
-MAINT = @MAINT@
-PACKAGE = @PACKAGE@
-STRIP = @STRIP@
-TARGET = @TARGET@
-VERSION = 2#                      main version number from cxsc
-am__include = @am__include@
-am__quote = @am__quote@
-cxsc_mfpmath_flag = @cxsc_mfpmath_flag@
-install_sh = @install_sh@
-
-# Changes: added ACLOCAL_AMFLAGS and removed comments with leading tabs! (jakob Kroeker, kroeker@uni-math.gwdg.de)
-
-# This file is the Makefile Template for the C-XSC library
-# ========================================================
-
-# Settings for all systems -------------------------------------------
-CCINC = -I. -I../.. -I../rts -I../asm# 
-CCFLAGS = $(CCINC) $(CCOPTS)#
-
-CXXINC = -I. -I.. -Irts/ -Ifi_lib/ -Iasm/#
-CXXFLAGS = $(CXXINC) $(CXXOPTS)#
-
-#AR=ar#                   put object file into archive
-#RANLIB=ranlib#           generate index to archive
-LN = ln -sf#                how to create soft links
-
-RM = rm -f#                remove files (forced)
-RMDIR = rm -rf#            remove directory
-
-
-#INSTALL=$(GINSTALL) -m 644#  copy files
-#INSTALLEXE=$(GINSTALL) -m 755# copy binary file
-#STRIP=#strip -g          strip executables from debug symbols
-#INSTDIR=$(GINSTALL) -d#      create installation directory
-VER = 2.5.1
-PATCHLEVEL = 5#                   patchlevel number from cxsc
-SUBLEVEL = 1#                     not released version
-RELEASE = 2.5.1#                  current release
-PKGNAME = BUWcxsc#                sun solaris package name
-
-
-#========== you shouldn't modify anything below ===========================
-TOPDIR = $(shell /bin/pwd)
-ARCH = $(shell uname -m | sed -e s/i.86/i386/ -e s/sun4u/sparc/)
-CXSCRELEASE = $(VERSION).$(PATCHLEVEL).$(SUBLEVEL)
-CXSCPATH = cxsc-$(shell echo $(CXSCRELEASE) | sed -e "s/-//")
-BUILDTMP = /var/spool/pkg
-TMPDIR = $(TOPDIR)/tmp
-RPATH = $(LINKERPATH)
-subdir = .
-ACLOCAL_M4 = $(top_srcdir)/aclocal.m4
-mkinstalldirs = $(SHELL) $(top_srcdir)/cnf/mkinstalldirs
-CONFIG_CLEAN_FILES = install_cxsc
-DIST_SOURCES =
-DIST_COMMON = README ChangeLog Makefile.am Makefile.in aclocal.m4 \
-	cnf/config.guess cnf/config.sub cnf/configure.ac cnf/depcomp \
-	cnf/install-sh cnf/ltmain.sh cnf/missing cnf/mkinstalldirs \
-	config.guess config.sub configure configure.ac depcomp \
-	install-sh install_cxsc.in ltmain.sh missing mkinstalldirs
-all: all-am
-
-.SUFFIXES:
-
-am__CONFIG_DISTCLEAN_FILES = config.status config.cache config.log \
- configure.lineno
-$(srcdir)/Makefile.in: @MAINTAINER_MODE_TRUE@ Makefile.am  $(top_srcdir)/configure.ac $(ACLOCAL_M4)
-	cd $(top_srcdir) && \
-	  $(AUTOMAKE) --foreign  Makefile
-Makefile: @MAINTAINER_MODE_TRUE@ $(srcdir)/Makefile.in  $(top_builddir)/config.status
-	cd $(top_builddir) && $(SHELL) ./config.status $@ $(am__depfiles_maybe)
-
-$(top_builddir)/config.status: $(srcdir)/configure $(CONFIG_STATUS_DEPENDENCIES)
-	$(SHELL) ./config.status --recheck
-$(srcdir)/configure: @MAINTAINER_MODE_TRUE@ $(srcdir)/configure.ac $(ACLOCAL_M4) $(CONFIGURE_DEPENDENCIES)
-	cd $(srcdir) && $(AUTOCONF)
-
-$(ACLOCAL_M4): @MAINTAINER_MODE_TRUE@ configure.ac 
-	cd $(srcdir) && $(ACLOCAL) $(ACLOCAL_AMFLAGS)
-install_cxsc: $(top_builddir)/config.status install_cxsc.in
-	cd $(top_builddir) && $(SHELL) ./config.status $@
-uninstall-info-am:
-tags: TAGS
-TAGS:
-
-DISTFILES = $(DIST_COMMON) $(DIST_SOURCES) $(TEXINFOS) $(EXTRA_DIST)
-
-top_distdir = .
-distdir = $(PACKAGE)-$(VERSION)
-
-am__remove_distdir = \
-  { test ! -d $(distdir) \
-    || { find $(distdir) -type d ! -perm -200 -exec chmod u+w {} ';' \
-         && rm -fr $(distdir); }; }
-
-GZIP_ENV = --best
-distcleancheck_listfiles = find . -type f -print
-
-distdir: $(DISTFILES)
-	$(am__remove_distdir)
-	mkdir $(distdir)
-	$(mkinstalldirs) $(distdir)/. $(distdir)/cnf
-	@list='$(DISTFILES)'; for file in $$list; do \
-	  if test -f $$file || test -d $$file; then d=.; else d=$(srcdir); fi; \
-	  dir=`echo "$$file" | sed -e 's,/[^/]*$$,,'`; \
-	  if test "$$dir" != "$$file" && test "$$dir" != "."; then \
-	    dir="/$$dir"; \
-	    $(mkinstalldirs) "$(distdir)$$dir"; \
-	  else \
-	    dir=''; \
-	  fi; \
-	  if test -d $$d/$$file; then \
-	    if test -d $(srcdir)/$$file && test $$d != $(srcdir); then \
-	      cp -pR $(srcdir)/$$file $(distdir)$$dir || exit 1; \
-	    fi; \
-	    cp -pR $$d/$$file $(distdir)$$dir || exit 1; \
-	  else \
-	    test -f $(distdir)/$$file \
-	    || cp -p $$d/$$file $(distdir)/$$file \
-	    || exit 1; \
-	  fi; \
-	done
-	-find $(distdir) -type d ! -perm -777 -exec chmod a+rwx {} \; -o \
-	  ! -type d ! -perm -444 -links 1 -exec chmod a+r {} \; -o \
-	  ! -type d ! -perm -400 -exec chmod a+r {} \; -o \
-	  ! -type d ! -perm -444 -exec $(SHELL) $(install_sh) -c -m a+r {} {} \; \
-	|| chmod -R a+r $(distdir)
-dist-gzip: distdir
-	$(AMTAR) chof - $(distdir) | GZIP=$(GZIP_ENV) gzip -c >$(distdir).tar.gz
-	$(am__remove_distdir)
-
-dist dist-all: distdir
-	$(AMTAR) chof - $(distdir) | GZIP=$(GZIP_ENV) gzip -c >$(distdir).tar.gz
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diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.am b/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.am
deleted file mode 100644
index de5c14a..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.am
+++ /dev/null
@@ -1,187 +0,0 @@
-#############################################################################
-##
-#W Makefile.am                                              Laurent Bartholdi
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2007, Laurent Bartholdi
-##
-#############################################################################
-##
-##  This compiles the module polroots, and creates archives
-##
-#############################################################################
-ACLOCAL_AMFLAGS = -I m4
-
-
-GAC=@GAC@
-GAP=@GAPPROG@
-LOCALBIN=bin/@TARGET@
-EXTERN=$(CURDIR)/bin/@TARGET@/extern
-GACFLAGS=@GACFLAGS@ -p -g @GAC_stack_protector_flag@
-GACPP=bin/@TARGET@/gac++
-MPFRLIB=mpfr-3.1.0
-MPFILIB=mpfi-1.5
-MPCLIB=mpc-0.9
-FPLLLLIB=libfplll-3.1.3
-CXSCLIB=cxsc-2-5-1
-
-.PHONY: all distribute doc clean mrproper wwwdir checkblocks \
-	lib mpfrlib mpfilib mpclib fpllllib cxsclib  
-
-all: @LIB_TARGET@ @DLL_TARGET@
-
-lib: mpfrlib mpfilib mpclib fpllllib cxsclib
-
-
-LINK = $(LIBTOOL) --tag=CC $(AM_LIBTOOLFLAGS) $(LIBTOOLFLAGS) \
-	--mode=link $(CCLD) $(AM_CFLAGS) $(CFLAGS) $(AM_LDFLAGS) \
-	$(LDFLAGS) -o $@
-	
-
-extern/$(MPFRLIB).tar.bz2: 
-	echo "I can't find $(MPFRLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www.mpfr.org/$(MPFRLIB)/$(MPFRLIB).tar.bz2 )
-
-extern/$(MPFILIB).tar.bz2: 
-	echo "I can't find $(MPFILIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  https://gforge.inria.fr/frs/download.php/27345/mpfi-1.5.tar.bz2   )
-
-extern/$(MPCLIB).tar.gz: 
-	echo "I can't find $(MPCLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www.multiprecision.org/mpc/download/$(MPCLIB).tar.gz  )
-
-extern/$(CXSCLIB).tar.gz: 
-	echo "I can't find $(CXSCLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www2.math.uni-wuppertal.de/~xsc/xsc/cxsc/$(CXSCLIB).tar.gz  )
-
-extern/$(FPLLLLIB).tar.gz: 
-	echo "I can't find $(FPLLLLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://perso.ens-lyon.fr/xavier.pujol/fplll/$(FPLLLLIB).tar.gz  )
-
-
-mpfrlib: extern/$(MPFRLIB).tar.bz2
-	if ! test -r $(EXTERN)/include/mpfr.h; then \
-	    cd extern && \
-	    tar -x -f $(MPFRLIB).tar.bz2 -j && \
-	    cd $(MPFRLIB) && \
-	    ./configure @CONFIGUREPARAMS@ @WITHGMP@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-mpfilib: @MPFRDEPEND@ extern/$(MPFILIB).tar.bz2
-	if ! test -r $(EXTERN)/include/mpfi.h; then \
-	    cd extern && \
-	    tar -x -f $(MPFILIB).tar.bz2 -j && \
-	    cd $(MPFILIB) && \
-	    ./configure  @CONFIGUREPARAMS@ @WITHGMP@ @WITHMPFR@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-mpclib: @MPFRDEPEND@ extern/$(MPCLIB).tar.gz
-	if ! test -r $(EXTERN)/include/mpc.h; then \
-	    cd extern && \
-	    tar -x -f $(MPCLIB).tar.gz -z && \
-	    cd $(MPCLIB) && \
-	    ./configure  @CONFIGUREPARAMS@  @WITHGMP@ @WITHMPFR@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-fpllllib: @MPFRDEPEND@ extern/$(FPLLLLIB).tar.gz
-	if ! test -r $(EXTERN)/include/fplll.h; then \
-	    cd extern && \
-	    tar -x -f $(FPLLLLIB).tar.gz -z && \
-	    cd $(FPLLLLIB) && \
-	    ./configure  @CONFIGUREPARAMS@ CPPFLAGS="@INCLGMP@ @INCLMPFR@ $(CPPFLAGS)" LDFLAGS="@LINKGMP@ @LINKMPFR@ $(LDFLAGS)" --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-cxsclib: extern/$(CXSCLIB).tar.gz
-	mkdir -p $(EXTERN)
-	rm -f $(EXTERN)/cxsc
-	ln -s . $(EXTERN)/cxsc
-# a dirty hack: we'll pretend our home directory
-# is $(EXTERN), and the installation will go into $(EXTERN)/cxsc
-	if ! test -r $(EXTERN)/include/real.hpp; then \
-	    cd extern && \
-	    tar -x -f $(CXSCLIB).tar.gz -z && \
-	    cd $(CXSCLIB) && \
-	    (echo "yes"; for i in 1 2 3 4 5 6 7 8 9 10; do echo ""; done) | \
-		HOME=$(EXTERN) ./install_cxsc; \
-	fi
-
-distribute: doc wwwdir doc tarballs
-	rsync -arvp --delete www/ laurent@elanpc00.uni-math.gwdg.de:public_html/Float/
-
-$(LOCALBIN):
-	mkdir -p $(LOCALBIN)
-
-$(GACPP):
-	sed -e 's/"gcc"/"g++"/g' -e 's/\([* ]\.\)c/\1C/g' < $(GAC) > $(GACPP)
-	chmod a+x $(GACPP)
-
-$(LOCALBIN)/%.o: src/%.C $(GACPP)
-	$(GACPP) $(GACFLAGS) -d -o $@ -c $<
-
-$(LOCALBIN)/%.o: src/%.c
-	$(GAC) $(GACFLAGS) -d -o $@ -c $<
-
-$(LOCALBIN)/mp_float.so: @MP_FLOAT_O@ $(GACPP)
-	$(GACPP) $(GACFLAGS) -d -o $@ @MP_FLOAT_O@ @MP_FLOAT_LIB@
-
-$(LOCALBIN)/cxsc_float.so: @CXSC_FLOAT_O@ $(GACPP)
-	$(GACPP) $(GACFLAGS) -d -o $@ @CXSC_FLOAT_O@ @CXSC_FLOAT_LIB@
-
-$(LOCALBIN)/mp_float.o: src/mp_float.c src/mp_float.h
-
-$(LOCALBIN)/mpfr.o: src/mpfr.c src/mp_float.h
-
-$(LOCALBIN)/mpfi.o: src/mpfi.c src/mp_float.h
-
-$(LOCALBIN)/mpc.o: src/mpc.c src/mp_float.h
-
-$(LOCALBIN)/fplll.o: src/fplll.C
-
-$(LOCALBIN)/mp_poly.o: src/cpoly.C src/mp_poly.C
-
-$(LOCALBIN)/cxsc_poly.o: src/cpoly.C src/cxsc_poly.C src/cxsc_float.h
-
-clean:
-	rm -rf .version $(LOCALBIN) `find doc -type l`
-
-configure: cnf/Makefile.in cnf/configure.ac
-	(cd cnf; autoconf; mv -f configure ..)
-
-mrproper: clean
-	rm Makefile
-
-.version: PackageInfo.g
-	grep '^Version :=' $< | awk -F'"' '{print $$2}' > $@
-
-wwwdir: .version tarballs
-	mkdir -p www
-	rm -f `find www -type l`
-	cp README www/README.float
-	cp PackageInfo.g www/PackageInfo.g
-	cp doc/chap0.html www/index.html
-	ln -s float-`cat .version`.tar.gz www/float.tar.gz
-	cp doc/manual.pdf www/manual.pdf
-	(cd doc; for i in *.html; do cp $$i ../www/$$i; done)
-	cp doc/manual.css www/manual.css
-
-doc: doc/chap0.html
-
-doc/chap0.html: doc/float.xml lib/float.gd
-	echo 'LoadPackage("float"); MAKEDOC@Float();' | $(GAP)
-
-checkblocks:
-	grep '<#GAPDoc' lib/*.g[di] | awk -F'"' '{print $$2}' | sort > @@-blocks
-	grep '<#Include' doc/float.xml | awk -F'"' '{print $$2}' | sort > @@-in
-	comm -3 @@-blocks @@-in
-	rm @@-blocks @@-in
-
-tarballs: .version doc
-	mkdir -p www
-	tar cfz www/float-`cat .version`.tar.gz --exclude '*~' --exclude sandbox --exclude bin --exclude www --exclude CVS --exclude .version --exclude cnf/autom4te.cache --exclude 'Makefile*' --exclude config.log --exclude 'extern/*-[0-9]*' -C .. float
-
-#E Makefile . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in b/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in
deleted file mode 100644
index 2eaba3e..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in
+++ /dev/null
@@ -1,698 +0,0 @@
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-#W Makefile.am                                              Laurent Bartholdi
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-#E Makefile . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
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diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in.backup b/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in.backup
deleted file mode 100644
index 66d864b..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in.backup
+++ /dev/null
@@ -1,183 +0,0 @@
-#############################################################################
-##
-#W Makefile.in                                              Laurent Bartholdi
-##
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-	    $(MAKE) install; \
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-	    $(MAKE) install; \
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-	ln -s . $(EXTERN)/cxsc
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-<<<<<<< Makefile.in
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-	    tar xfz $(CXSCLIB).tar.gz && \
-=======
-	    cd extern && \
-	    tar -x -f $(CXSCLIB).tar.gz -z && \
->>>>>>> 1.22
-	    cd $(CXSCLIB) && \
-	    (echo "yes"; for i in 1 2 3 4 5 6 ; do echo ""; done; echo $(EXTERN) ;  for i in 8 9 10; do echo ""; done) | \
-		./install_cxsc; \
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-.version: PackageInfo.g
-	grep '^Version :=' $< | awk -F'"' '{print $$2}' > $@
-
-wwwdir: .version tarballs
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-	cp README www/README.float
-	cp PackageInfo.g www/PackageInfo.g
-	cp doc/chap0.html www/index.html
-	ln -s float-`cat .version`.tar.gz www/float.tar.gz
-	cp doc/manual.pdf www/manual.pdf
-	(cd doc; for i in *.html; do cp $$i ../www/$$i; done)
-	cp doc/manual.css www/manual.css
-
-doc: doc/chap0.html
-
-doc/chap0.html: doc/float.xml lib/float.gd
-	echo 'LoadPackage("float"); MAKEDOC@Float();' | $(GAP)
-
-checkblocks:
-	grep '<#GAPDoc' lib/*.g[di] | awk -F'"' '{print $$2}' | sort > @@-blocks
-	grep '<#Include' doc/float.xml | awk -F'"' '{print $$2}' | sort > @@-in
-	comm -3 @@-blocks @@-in
-	rm @@-blocks @@-in
-
-tarballs: .version doc
-	mkdir -p www
-	tar cfz www/float-`cat .version`.tar.gz --exclude '*~' --exclude sandbox --exclude bin --exclude www --exclude CVS --exclude .version --exclude cnf/autom4te.cache --exclude 'Makefile*' --exclude config.log --exclude 'extern/*-[0-9]*' -C .. float
-
-#E Makefile . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in.backup2 b/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in.backup2
deleted file mode 100644
index 8c8b5c3..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/Makefile.in.backup2
+++ /dev/null
@@ -1,185 +0,0 @@
-#############################################################################
-##
-#W Makefile.in                                              Laurent Bartholdi
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2007, Laurent Bartholdi
-##
-#############################################################################
-##
-##  This compiles the module polroots, and creates archives
-##
-#############################################################################
-
-GAC=@GAC@
-GAP=@GAPPROG@
-LOCALBIN=bin/@TARGET@
-EXTERN=$(CURDIR)/bin/@TARGET@/extern
-GACFLAGS=@GACFLAGS@ -p -g @GAC_stack_protector_flag@
-GACPP=bin/@TARGET@/gac++
-MPFRLIB=mpfr-3.1.0
-MPFILIB=mpfi-1.5
-MPCLIB=mpc-0.9
-FPLLLLIB=libfplll-3.1.3
-CXSCLIB=cxsc-2-5-1
-
-.PHONY: all distribute doc clean mrproper wwwdir checkblocks \
-	lib mpfrlib mpfilib mpclib fpllllib cxsclib  
-
-all: @LIB_TARGET@ @DLL_TARGET@
-
-lib: mpfrlib mpfilib mpclib fpllllib cxsclib
-
-
-LINK = $(LIBTOOL) --tag=CC $(AM_LIBTOOLFLAGS) $(LIBTOOLFLAGS) \
-	--mode=link $(CCLD) $(AM_CFLAGS) $(CFLAGS) $(AM_LDFLAGS) \
-	$(LDFLAGS) -o $@
-	
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-	echo "I can't find $(MPFRLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www.mpfr.org/$(MPFRLIB)/$(MPFRLIB).tar.bz2 )
-
-extern/$(MPFILIB).tar.bz2: 
-	echo "I can't find $(MPFILIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  https://gforge.inria.fr/frs/download.php/27345/mpfi-1.5.tar.bz2   )
-
-extern/$(MPCLIB).tar.gz: 
-	echo "I can't find $(MPCLIB), so I'm going to download it"
-	(cd extern; @GETBIN@ @GETBINPARAM@  http://www.multiprecision.org/mpc/download/$(MPCLIB).tar.gz  )
-
-extern/$(CXSCLIB).tar.gz: 
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-
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-
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-	    cd $(MPFILIB) && \
-	    ./configure  @CONFIGUREPARAMS@ @WITHGMP@ @WITHMPFR@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-mpclib: @MPFRDEPEND@ extern/$(MPCLIB).tar.gz
-	if ! test -r $(EXTERN)/include/mpc.h; then \
-	    cd extern && \
-	    tar -x -f $(MPCLIB).tar.gz -z && \
-	    cd $(MPCLIB) && \
-	    ./configure  @CONFIGUREPARAMS@  @WITHGMP@ @WITHMPFR@ --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-fpllllib: @MPFRDEPEND@ extern/$(FPLLLLIB).tar.gz
-	if ! test -r $(EXTERN)/include/fplll.h; then \
-	    cd extern && \
-	    tar -x -f $(FPLLLLIB).tar.gz -z && \
-	    cd $(FPLLLLIB) && \
-	    ./configure  @CONFIGUREPARAMS@ CPPFLAGS="\"@INCLGMP@ @INCLMPFR@ $(CPPFLAGS)\"" LDFLAGS="\"@LINKGMP@ @LINKMPFR@ $(LDFLAGS)\"" --prefix=$(EXTERN) && \
-	    $(MAKE) install; \
-	fi
-
-cxsclib: extern/$(CXSCLIB).tar.gz
-	mkdir -p $(EXTERN)
-	rm -f $(EXTERN)/cxsc
-	ln -s . $(EXTERN)/cxsc
-# a dirty hack: we'll pretend our home directory
-# is $(EXTERN), and the installation will go into $(EXTERN)/cxsc
-	if ! test -r $(EXTERN)/include/real.hpp; then \
-	    cd extern && \
-	    tar -x -f $(CXSCLIB).tar.gz -z && \
-	    cd $(CXSCLIB) && \
-	    (echo "yes"; for i in 1 2 3 4 5 6 7 8 9 10; do echo ""; done) | \
-		HOME=$(EXTERN) ./install_cxsc; \
-	fi
-
-distribute: doc wwwdir doc tarballs
-	rsync -arvp --delete www/ laurent@elanpc00.uni-math.gwdg.de:public_html/Float/
-
-$(LOCALBIN):
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-$(GACPP):
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-	(cd cnf; autoconf; mv -f configure ..)
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-	rm Makefile
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-	grep '^Version :=' $< | awk -F'"' '{print $$2}' > $@
-
-wwwdir: .version tarballs
-	mkdir -p www
-	rm -f `find www -type l`
-	cp README www/README.float
-	cp PackageInfo.g www/PackageInfo.g
-	cp doc/chap0.html www/index.html
-	ln -s float-`cat .version`.tar.gz www/float.tar.gz
-	cp doc/manual.pdf www/manual.pdf
-	(cd doc; for i in *.html; do cp $$i ../www/$$i; done)
-	cp doc/manual.css www/manual.css
-
-doc: doc/chap0.html
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-doc/chap0.html: doc/float.xml lib/float.gd
-	echo 'LoadPackage("float"); MAKEDOC@Float();' | $(GAP)
-
-checkblocks:
-	grep '<#GAPDoc' lib/*.g[di] | awk -F'"' '{print $$2}' | sort > @@-blocks
-	grep '<#Include' doc/float.xml | awk -F'"' '{print $$2}' | sort > @@-in
-	comm -3 @@-blocks @@-in
-	rm @@-blocks @@-in
-
-tarballs: .version doc
-	mkdir -p www
-	tar cfz www/float-`cat .version`.tar.gz --exclude '*~' --exclude sandbox --exclude bin --exclude www --exclude CVS --exclude .version --exclude cnf/autom4te.cache --exclude 'Makefile*' --exclude config.log --exclude 'extern/*-[0-9]*' -C .. float
-
-#E Makefile . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/aclocal.m4 b/sandbox/hurwitz.kroeker/src/float/cnf/aclocal.m4
deleted file mode 100644
index b8c5a73..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/aclocal.m4
+++ /dev/null
@@ -1,1021 +0,0 @@
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-m4_include([m4/ltversion.m4])
-m4_include([m4/lt~obsolete.m4])
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/config.guess b/sandbox/hurwitz.kroeker/src/float/cnf/config.guess
deleted file mode 100755
index 8152efd..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/config.guess
+++ /dev/null
@@ -1,1522 +0,0 @@
-#! /bin/sh
-# Attempt to guess a canonical system name.
-#   Copyright (C) 1992, 1993, 1994, 1995, 1996, 1997, 1998, 1999,
-#   2000, 2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008, 2009, 2010,
-#   2011 Free Software Foundation, Inc.
-
-timestamp='2011-11-11'
-
-# This file is free software; you can redistribute it and/or modify it
-# under the terms of the GNU General Public License as published by
-# the Free Software Foundation; either version 2 of the License, or
-# (at your option) any later version.
-#
-# This program is distributed in the hope that it will be useful, but
-# WITHOUT ANY WARRANTY; without even the implied warranty of
-# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU
-# General Public License for more details.
-#
-# You should have received a copy of the GNU General Public License
-# along with this program; if not, write to the Free Software
-# Foundation, Inc., 51 Franklin Street - Fifth Floor, Boston, MA
-# 02110-1301, USA.
-#
-# As a special exception to the GNU General Public License, if you
-# distribute this file as part of a program that contains a
-# configuration script generated by Autoconf, you may include it under
-# the same distribution terms that you use for the rest of that program.
-
-
-# Originally written by Per Bothner.  Please send patches (context
-# diff format) to <config-patches@gnu.org> and include a ChangeLog
-# entry.
-#
-# This script attempts to guess a canonical system name similar to
-# config.sub.  If it succeeds, it prints the system name on stdout, and
-# exits with 0.  Otherwise, it exits with 1.
-#
-# You can get the latest version of this script from:
-# http://git.savannah.gnu.org/gitweb/?p=config.git;a=blob_plain;f=config.guess;hb=HEAD
-
-me=`echo "$0" | sed -e 's,.*/,,'`
-
-usage="\
-Usage: $0 [OPTION]
-
-Output the configuration name of the system \`$me' is run on.
-
-Operation modes:
-  -h, --help         print this help, then exit
-  -t, --time-stamp   print date of last modification, then exit
-  -v, --version      print version number, then exit
-
-Report bugs and patches to <config-patches@gnu.org>."
-
-version="\
-GNU config.guess ($timestamp)
-
-Originally written by Per Bothner.
-Copyright (C) 1992, 1993, 1994, 1995, 1996, 1997, 1998, 1999, 2000,
-2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008, 2009, 2010, 2011 Free
-Software Foundation, Inc.
-
-This is free software; see the source for copying conditions.  There is NO
-warranty; not even for MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE."
-
-help="
-Try \`$me --help' for more information."
-
-# Parse command line
-while test $# -gt 0 ; do
-  case $1 in
-    --time-stamp | --time* | -t )
-       echo "$timestamp" ; exit ;;
-    --version | -v )
-       echo "$version" ; exit ;;
-    --help | --h* | -h )
-       echo "$usage"; exit ;;
-    -- )     # Stop option processing
-       shift; break ;;
-    - )	# Use stdin as input.
-       break ;;
-    -* )
-       echo "$me: invalid option $1$help" >&2
-       exit 1 ;;
-    * )
-       break ;;
-  esac
-done
-
-if test $# != 0; then
-  echo "$me: too many arguments$help" >&2
-  exit 1
-fi
-
-trap 'exit 1' 1 2 15
-
-# CC_FOR_BUILD -- compiler used by this script. Note that the use of a
-# compiler to aid in system detection is discouraged as it requires
-# temporary files to be created and, as you can see below, it is a
-# headache to deal with in a portable fashion.
-
-# Historically, `CC_FOR_BUILD' used to be named `HOST_CC'. We still
-# use `HOST_CC' if defined, but it is deprecated.
-
-# Portable tmp directory creation inspired by the Autoconf team.
-
-set_cc_for_build='
-trap "exitcode=\$?; (rm -f \$tmpfiles 2>/dev/null; rmdir \$tmp 2>/dev/null) && exit \$exitcode" 0 ;
-trap "rm -f \$tmpfiles 2>/dev/null; rmdir \$tmp 2>/dev/null; exit 1" 1 2 13 15 ;
-: ${TMPDIR=/tmp} ;
- { tmp=`(umask 077 && mktemp -d "$TMPDIR/cgXXXXXX") 2>/dev/null` && test -n "$tmp" && test -d "$tmp" ; } ||
- { test -n "$RANDOM" && tmp=$TMPDIR/cg$$-$RANDOM && (umask 077 && mkdir $tmp) ; } ||
- { tmp=$TMPDIR/cg-$$ && (umask 077 && mkdir $tmp) && echo "Warning: creating insecure temp directory" >&2 ; } ||
- { echo "$me: cannot create a temporary directory in $TMPDIR" >&2 ; exit 1 ; } ;
-dummy=$tmp/dummy ;
-tmpfiles="$dummy.c $dummy.o $dummy.rel $dummy" ;
-case $CC_FOR_BUILD,$HOST_CC,$CC in
- ,,)    echo "int x;" > $dummy.c ;
-	for c in cc gcc c89 c99 ; do
-	  if ($c -c -o $dummy.o $dummy.c) >/dev/null 2>&1 ; then
-	     CC_FOR_BUILD="$c"; break ;
-	  fi ;
-	done ;
-	if test x"$CC_FOR_BUILD" = x ; then
-	  CC_FOR_BUILD=no_compiler_found ;
-	fi
-	;;
- ,,*)   CC_FOR_BUILD=$CC ;;
- ,*,*)  CC_FOR_BUILD=$HOST_CC ;;
-esac ; set_cc_for_build= ;'
-
-# This is needed to find uname on a Pyramid OSx when run in the BSD universe.
-# (ghazi@noc.rutgers.edu 1994-08-24)
-if (test -f /.attbin/uname) >/dev/null 2>&1 ; then
-	PATH=$PATH:/.attbin ; export PATH
-fi
-
-UNAME_MACHINE=`(uname -m) 2>/dev/null` || UNAME_MACHINE=unknown
-UNAME_RELEASE=`(uname -r) 2>/dev/null` || UNAME_RELEASE=unknown
-UNAME_SYSTEM=`(uname -s) 2>/dev/null`  || UNAME_SYSTEM=unknown
-UNAME_VERSION=`(uname -v) 2>/dev/null` || UNAME_VERSION=unknown
-
-# Note: order is significant - the case branches are not exclusive.
-
-case "${UNAME_MACHINE}:${UNAME_SYSTEM}:${UNAME_RELEASE}:${UNAME_VERSION}" in
-    *:NetBSD:*:*)
-	# NetBSD (nbsd) targets should (where applicable) match one or
-	# more of the tupples: *-*-netbsdelf*, *-*-netbsdaout*,
-	# *-*-netbsdecoff* and *-*-netbsd*.  For targets that recently
-	# switched to ELF, *-*-netbsd* would select the old
-	# object file format.  This provides both forward
-	# compatibility and a consistent mechanism for selecting the
-	# object file format.
-	#
-	# Note: NetBSD doesn't particularly care about the vendor
-	# portion of the name.  We always set it to "unknown".
-	sysctl="sysctl -n hw.machine_arch"
-	UNAME_MACHINE_ARCH=`(/sbin/$sysctl 2>/dev/null || \
-	    /usr/sbin/$sysctl 2>/dev/null || echo unknown)`
-	case "${UNAME_MACHINE_ARCH}" in
-	    armeb) machine=armeb-unknown ;;
-	    arm*) machine=arm-unknown ;;
-	    sh3el) machine=shl-unknown ;;
-	    sh3eb) machine=sh-unknown ;;
-	    sh5el) machine=sh5le-unknown ;;
-	    *) machine=${UNAME_MACHINE_ARCH}-unknown ;;
-	esac
-	# The Operating System including object format, if it has switched
-	# to ELF recently, or will in the future.
-	case "${UNAME_MACHINE_ARCH}" in
-	    arm*|i386|m68k|ns32k|sh3*|sparc|vax)
-		eval $set_cc_for_build
-		if echo __ELF__ | $CC_FOR_BUILD -E - 2>/dev/null \
-			| grep -q __ELF__
-		then
-		    # Once all utilities can be ECOFF (netbsdecoff) or a.out (netbsdaout).
-		    # Return netbsd for either.  FIX?
-		    os=netbsd
-		else
-		    os=netbsdelf
-		fi
-		;;
-	    *)
-		os=netbsd
-		;;
-	esac
-	# The OS release
-	# Debian GNU/NetBSD machines have a different userland, and
-	# thus, need a distinct triplet. However, they do not need
-	# kernel version information, so it can be replaced with a
-	# suitable tag, in the style of linux-gnu.
-	case "${UNAME_VERSION}" in
-	    Debian*)
-		release='-gnu'
-		;;
-	    *)
-		release=`echo ${UNAME_RELEASE}|sed -e 's/[-_].*/\./'`
-		;;
-	esac
-	# Since CPU_TYPE-MANUFACTURER-KERNEL-OPERATING_SYSTEM:
-	# contains redundant information, the shorter form:
-	# CPU_TYPE-MANUFACTURER-OPERATING_SYSTEM is used.
-	echo "${machine}-${os}${release}"
-	exit ;;
-    *:OpenBSD:*:*)
-	UNAME_MACHINE_ARCH=`arch | sed 's/OpenBSD.//'`
-	echo ${UNAME_MACHINE_ARCH}-unknown-openbsd${UNAME_RELEASE}
-	exit ;;
-    *:ekkoBSD:*:*)
-	echo ${UNAME_MACHINE}-unknown-ekkobsd${UNAME_RELEASE}
-	exit ;;
-    *:SolidBSD:*:*)
-	echo ${UNAME_MACHINE}-unknown-solidbsd${UNAME_RELEASE}
-	exit ;;
-    macppc:MirBSD:*:*)
-	echo powerpc-unknown-mirbsd${UNAME_RELEASE}
-	exit ;;
-    *:MirBSD:*:*)
-	echo ${UNAME_MACHINE}-unknown-mirbsd${UNAME_RELEASE}
-	exit ;;
-    alpha:OSF1:*:*)
-	case $UNAME_RELEASE in
-	*4.0)
-		UNAME_RELEASE=`/usr/sbin/sizer -v | awk '{print $3}'`
-		;;
-	*5.*)
-		UNAME_RELEASE=`/usr/sbin/sizer -v | awk '{print $4}'`
-		;;
-	esac
-	# According to Compaq, /usr/sbin/psrinfo has been available on
-	# OSF/1 and Tru64 systems produced since 1995.  I hope that
-	# covers most systems running today.  This code pipes the CPU
-	# types through head -n 1, so we only detect the type of CPU 0.
-	ALPHA_CPU_TYPE=`/usr/sbin/psrinfo -v | sed -n -e 's/^  The alpha \(.*\) processor.*$/\1/p' | head -n 1`
-	case "$ALPHA_CPU_TYPE" in
-	    "EV4 (21064)")
-		UNAME_MACHINE="alpha" ;;
-	    "EV4.5 (21064)")
-		UNAME_MACHINE="alpha" ;;
-	    "LCA4 (21066/21068)")
-		UNAME_MACHINE="alpha" ;;
-	    "EV5 (21164)")
-		UNAME_MACHINE="alphaev5" ;;
-	    "EV5.6 (21164A)")
-		UNAME_MACHINE="alphaev56" ;;
-	    "EV5.6 (21164PC)")
-		UNAME_MACHINE="alphapca56" ;;
-	    "EV5.7 (21164PC)")
-		UNAME_MACHINE="alphapca57" ;;
-	    "EV6 (21264)")
-		UNAME_MACHINE="alphaev6" ;;
-	    "EV6.7 (21264A)")
-		UNAME_MACHINE="alphaev67" ;;
-	    "EV6.8CB (21264C)")
-		UNAME_MACHINE="alphaev68" ;;
-	    "EV6.8AL (21264B)")
-		UNAME_MACHINE="alphaev68" ;;
-	    "EV6.8CX (21264D)")
-		UNAME_MACHINE="alphaev68" ;;
-	    "EV6.9A (21264/EV69A)")
-		UNAME_MACHINE="alphaev69" ;;
-	    "EV7 (21364)")
-		UNAME_MACHINE="alphaev7" ;;
-	    "EV7.9 (21364A)")
-		UNAME_MACHINE="alphaev79" ;;
-	esac
-	# A Pn.n version is a patched version.
-	# A Vn.n version is a released version.
-	# A Tn.n version is a released field test version.
-	# A Xn.n version is an unreleased experimental baselevel.
-	# 1.2 uses "1.2" for uname -r.
-	echo ${UNAME_MACHINE}-dec-osf`echo ${UNAME_RELEASE} | sed -e 's/^[PVTX]//' | tr 'ABCDEFGHIJKLMNOPQRSTUVWXYZ' 'abcdefghijklmnopqrstuvwxyz'`
-	# Reset EXIT trap before exiting to avoid spurious non-zero exit code.
-	exitcode=$?
-	trap '' 0
-	exit $exitcode ;;
-    Alpha\ *:Windows_NT*:*)
-	# How do we know it's Interix rather than the generic POSIX subsystem?
-	# Should we change UNAME_MACHINE based on the output of uname instead
-	# of the specific Alpha model?
-	echo alpha-pc-interix
-	exit ;;
-    21064:Windows_NT:50:3)
-	echo alpha-dec-winnt3.5
-	exit ;;
-    Amiga*:UNIX_System_V:4.0:*)
-	echo m68k-unknown-sysv4
-	exit ;;
-    *:[Aa]miga[Oo][Ss]:*:*)
-	echo ${UNAME_MACHINE}-unknown-amigaos
-	exit ;;
-    *:[Mm]orph[Oo][Ss]:*:*)
-	echo ${UNAME_MACHINE}-unknown-morphos
-	exit ;;
-    *:OS/390:*:*)
-	echo i370-ibm-openedition
-	exit ;;
-    *:z/VM:*:*)
-	echo s390-ibm-zvmoe
-	exit ;;
-    *:OS400:*:*)
-	echo powerpc-ibm-os400
-	exit ;;
-    arm:RISC*:1.[012]*:*|arm:riscix:1.[012]*:*)
-	echo arm-acorn-riscix${UNAME_RELEASE}
-	exit ;;
-    arm:riscos:*:*|arm:RISCOS:*:*)
-	echo arm-unknown-riscos
-	exit ;;
-    SR2?01:HI-UX/MPP:*:* | SR8000:HI-UX/MPP:*:*)
-	echo hppa1.1-hitachi-hiuxmpp
-	exit ;;
-    Pyramid*:OSx*:*:* | MIS*:OSx*:*:* | MIS*:SMP_DC-OSx*:*:*)
-	# akee@wpdis03.wpafb.af.mil (Earle F. Ake) contributed MIS and NILE.
-	if test "`(/bin/universe) 2>/dev/null`" = att ; then
-		echo pyramid-pyramid-sysv3
-	else
-		echo pyramid-pyramid-bsd
-	fi
-	exit ;;
-    NILE*:*:*:dcosx)
-	echo pyramid-pyramid-svr4
-	exit ;;
-    DRS?6000:unix:4.0:6*)
-	echo sparc-icl-nx6
-	exit ;;
-    DRS?6000:UNIX_SV:4.2*:7* | DRS?6000:isis:4.2*:7*)
-	case `/usr/bin/uname -p` in
-	    sparc) echo sparc-icl-nx7; exit ;;
-	esac ;;
-    s390x:SunOS:*:*)
-	echo ${UNAME_MACHINE}-ibm-solaris2`echo ${UNAME_RELEASE}|sed -e 's/[^.]*//'`
-	exit ;;
-    sun4H:SunOS:5.*:*)
-	echo sparc-hal-solaris2`echo ${UNAME_RELEASE}|sed -e 's/[^.]*//'`
-	exit ;;
-    sun4*:SunOS:5.*:* | tadpole*:SunOS:5.*:*)
-	echo sparc-sun-solaris2`echo ${UNAME_RELEASE}|sed -e 's/[^.]*//'`
-	exit ;;
-    i86pc:AuroraUX:5.*:* | i86xen:AuroraUX:5.*:*)
-	echo i386-pc-auroraux${UNAME_RELEASE}
-	exit ;;
-    i86pc:SunOS:5.*:* | i86xen:SunOS:5.*:*)
-	eval $set_cc_for_build
-	SUN_ARCH="i386"
-	# If there is a compiler, see if it is configured for 64-bit objects.
-	# Note that the Sun cc does not turn __LP64__ into 1 like gcc does.
-	# This test works for both compilers.
-	if [ "$CC_FOR_BUILD" != 'no_compiler_found' ]; then
-	    if (echo '#ifdef __amd64'; echo IS_64BIT_ARCH; echo '#endif') | \
-		(CCOPTS= $CC_FOR_BUILD -E - 2>/dev/null) | \
-		grep IS_64BIT_ARCH >/dev/null
-	    then
-		SUN_ARCH="x86_64"
-	    fi
-	fi
-	echo ${SUN_ARCH}-pc-solaris2`echo ${UNAME_RELEASE}|sed -e 's/[^.]*//'`
-	exit ;;
-    sun4*:SunOS:6*:*)
-	# According to config.sub, this is the proper way to canonicalize
-	# SunOS6.  Hard to guess exactly what SunOS6 will be like, but
-	# it's likely to be more like Solaris than SunOS4.
-	echo sparc-sun-solaris3`echo ${UNAME_RELEASE}|sed -e 's/[^.]*//'`
-	exit ;;
-    sun4*:SunOS:*:*)
-	case "`/usr/bin/arch -k`" in
-	    Series*|S4*)
-		UNAME_RELEASE=`uname -v`
-		;;
-	esac
-	# Japanese Language versions have a version number like `4.1.3-JL'.
-	echo sparc-sun-sunos`echo ${UNAME_RELEASE}|sed -e 's/-/_/'`
-	exit ;;
-    sun3*:SunOS:*:*)
-	echo m68k-sun-sunos${UNAME_RELEASE}
-	exit ;;
-    sun*:*:4.2BSD:*)
-	UNAME_RELEASE=`(sed 1q /etc/motd | awk '{print substr($5,1,3)}') 2>/dev/null`
-	test "x${UNAME_RELEASE}" = "x" && UNAME_RELEASE=3
-	case "`/bin/arch`" in
-	    sun3)
-		echo m68k-sun-sunos${UNAME_RELEASE}
-		;;
-	    sun4)
-		echo sparc-sun-sunos${UNAME_RELEASE}
-		;;
-	esac
-	exit ;;
-    aushp:SunOS:*:*)
-	echo sparc-auspex-sunos${UNAME_RELEASE}
-	exit ;;
-    # The situation for MiNT is a little confusing.  The machine name
-    # can be virtually everything (everything which is not
-    # "atarist" or "atariste" at least should have a processor
-    # > m68000).  The system name ranges from "MiNT" over "FreeMiNT"
-    # to the lowercase version "mint" (or "freemint").  Finally
-    # the system name "TOS" denotes a system which is actually not
-    # MiNT.  But MiNT is downward compatible to TOS, so this should
-    # be no problem.
-    atarist[e]:*MiNT:*:* | atarist[e]:*mint:*:* | atarist[e]:*TOS:*:*)
-	echo m68k-atari-mint${UNAME_RELEASE}
-	exit ;;
-    atari*:*MiNT:*:* | atari*:*mint:*:* | atarist[e]:*TOS:*:*)
-	echo m68k-atari-mint${UNAME_RELEASE}
-	exit ;;
-    *falcon*:*MiNT:*:* | *falcon*:*mint:*:* | *falcon*:*TOS:*:*)
-	echo m68k-atari-mint${UNAME_RELEASE}
-	exit ;;
-    milan*:*MiNT:*:* | milan*:*mint:*:* | *milan*:*TOS:*:*)
-	echo m68k-milan-mint${UNAME_RELEASE}
-	exit ;;
-    hades*:*MiNT:*:* | hades*:*mint:*:* | *hades*:*TOS:*:*)
-	echo m68k-hades-mint${UNAME_RELEASE}
-	exit ;;
-    *:*MiNT:*:* | *:*mint:*:* | *:*TOS:*:*)
-	echo m68k-unknown-mint${UNAME_RELEASE}
-	exit ;;
-    m68k:machten:*:*)
-	echo m68k-apple-machten${UNAME_RELEASE}
-	exit ;;
-    powerpc:machten:*:*)
-	echo powerpc-apple-machten${UNAME_RELEASE}
-	exit ;;
-    RISC*:Mach:*:*)
-	echo mips-dec-mach_bsd4.3
-	exit ;;
-    RISC*:ULTRIX:*:*)
-	echo mips-dec-ultrix${UNAME_RELEASE}
-	exit ;;
-    VAX*:ULTRIX*:*:*)
-	echo vax-dec-ultrix${UNAME_RELEASE}
-	exit ;;
-    2020:CLIX:*:* | 2430:CLIX:*:*)
-	echo clipper-intergraph-clix${UNAME_RELEASE}
-	exit ;;
-    mips:*:*:UMIPS | mips:*:*:RISCos)
-	eval $set_cc_for_build
-	sed 's/^	//' << EOF >$dummy.c
-#ifdef __cplusplus
-#include <stdio.h>  /* for printf() prototype */
-	int main (int argc, char *argv[]) {
-#else
-	int main (argc, argv) int argc; char *argv[]; {
-#endif
-	#if defined (host_mips) && defined (MIPSEB)
-	#if defined (SYSTYPE_SYSV)
-	  printf ("mips-mips-riscos%ssysv\n", argv[1]); exit (0);
-	#endif
-	#if defined (SYSTYPE_SVR4)
-	  printf ("mips-mips-riscos%ssvr4\n", argv[1]); exit (0);
-	#endif
-	#if defined (SYSTYPE_BSD43) || defined(SYSTYPE_BSD)
-	  printf ("mips-mips-riscos%sbsd\n", argv[1]); exit (0);
-	#endif
-	#endif
-	  exit (-1);
-	}
-EOF
-	$CC_FOR_BUILD -o $dummy $dummy.c &&
-	  dummyarg=`echo "${UNAME_RELEASE}" | sed -n 's/\([0-9]*\).*/\1/p'` &&
-	  SYSTEM_NAME=`$dummy $dummyarg` &&
-	    { echo "$SYSTEM_NAME"; exit; }
-	echo mips-mips-riscos${UNAME_RELEASE}
-	exit ;;
-    Motorola:PowerMAX_OS:*:*)
-	echo powerpc-motorola-powermax
-	exit ;;
-    Motorola:*:4.3:PL8-*)
-	echo powerpc-harris-powermax
-	exit ;;
-    Night_Hawk:*:*:PowerMAX_OS | Synergy:PowerMAX_OS:*:*)
-	echo powerpc-harris-powermax
-	exit ;;
-    Night_Hawk:Power_UNIX:*:*)
-	echo powerpc-harris-powerunix
-	exit ;;
-    m88k:CX/UX:7*:*)
-	echo m88k-harris-cxux7
-	exit ;;
-    m88k:*:4*:R4*)
-	echo m88k-motorola-sysv4
-	exit ;;
-    m88k:*:3*:R3*)
-	echo m88k-motorola-sysv3
-	exit ;;
-    AViiON:dgux:*:*)
-	# DG/UX returns AViiON for all architectures
-	UNAME_PROCESSOR=`/usr/bin/uname -p`
-	if [ $UNAME_PROCESSOR = mc88100 ] || [ $UNAME_PROCESSOR = mc88110 ]
-	then
-	    if [ ${TARGET_BINARY_INTERFACE}x = m88kdguxelfx ] || \
-	       [ ${TARGET_BINARY_INTERFACE}x = x ]
-	    then
-		echo m88k-dg-dgux${UNAME_RELEASE}
-	    else
-		echo m88k-dg-dguxbcs${UNAME_RELEASE}
-	    fi
-	else
-	    echo i586-dg-dgux${UNAME_RELEASE}
-	fi
-	exit ;;
-    M88*:DolphinOS:*:*)	# DolphinOS (SVR3)
-	echo m88k-dolphin-sysv3
-	exit ;;
-    M88*:*:R3*:*)
-	# Delta 88k system running SVR3
-	echo m88k-motorola-sysv3
-	exit ;;
-    XD88*:*:*:*) # Tektronix XD88 system running UTekV (SVR3)
-	echo m88k-tektronix-sysv3
-	exit ;;
-    Tek43[0-9][0-9]:UTek:*:*) # Tektronix 4300 system running UTek (BSD)
-	echo m68k-tektronix-bsd
-	exit ;;
-    *:IRIX*:*:*)
-	echo mips-sgi-irix`echo ${UNAME_RELEASE}|sed -e 's/-/_/g'`
-	exit ;;
-    ????????:AIX?:[12].1:2)   # AIX 2.2.1 or AIX 2.1.1 is RT/PC AIX.
-	echo romp-ibm-aix     # uname -m gives an 8 hex-code CPU id
-	exit ;;               # Note that: echo "'`uname -s`'" gives 'AIX '
-    i*86:AIX:*:*)
-	echo i386-ibm-aix
-	exit ;;
-    ia64:AIX:*:*)
-	if [ -x /usr/bin/oslevel ] ; then
-		IBM_REV=`/usr/bin/oslevel`
-	else
-		IBM_REV=${UNAME_VERSION}.${UNAME_RELEASE}
-	fi
-	echo ${UNAME_MACHINE}-ibm-aix${IBM_REV}
-	exit ;;
-    *:AIX:2:3)
-	if grep bos325 /usr/include/stdio.h >/dev/null 2>&1; then
-		eval $set_cc_for_build
-		sed 's/^		//' << EOF >$dummy.c
-		#include <sys/systemcfg.h>
-
-		main()
-			{
-			if (!__power_pc())
-				exit(1);
-			puts("powerpc-ibm-aix3.2.5");
-			exit(0);
-			}
-EOF
-		if $CC_FOR_BUILD -o $dummy $dummy.c && SYSTEM_NAME=`$dummy`
-		then
-			echo "$SYSTEM_NAME"
-		else
-			echo rs6000-ibm-aix3.2.5
-		fi
-	elif grep bos324 /usr/include/stdio.h >/dev/null 2>&1; then
-		echo rs6000-ibm-aix3.2.4
-	else
-		echo rs6000-ibm-aix3.2
-	fi
-	exit ;;
-    *:AIX:*:[4567])
-	IBM_CPU_ID=`/usr/sbin/lsdev -C -c processor -S available | sed 1q | awk '{ print $1 }'`
-	if /usr/sbin/lsattr -El ${IBM_CPU_ID} | grep ' POWER' >/dev/null 2>&1; then
-		IBM_ARCH=rs6000
-	else
-		IBM_ARCH=powerpc
-	fi
-	if [ -x /usr/bin/oslevel ] ; then
-		IBM_REV=`/usr/bin/oslevel`
-	else
-		IBM_REV=${UNAME_VERSION}.${UNAME_RELEASE}
-	fi
-	echo ${IBM_ARCH}-ibm-aix${IBM_REV}
-	exit ;;
-    *:AIX:*:*)
-	echo rs6000-ibm-aix
-	exit ;;
-    ibmrt:4.4BSD:*|romp-ibm:BSD:*)
-	echo romp-ibm-bsd4.4
-	exit ;;
-    ibmrt:*BSD:*|romp-ibm:BSD:*)            # covers RT/PC BSD and
-	echo romp-ibm-bsd${UNAME_RELEASE}   # 4.3 with uname added to
-	exit ;;                             # report: romp-ibm BSD 4.3
-    *:BOSX:*:*)
-	echo rs6000-bull-bosx
-	exit ;;
-    DPX/2?00:B.O.S.:*:*)
-	echo m68k-bull-sysv3
-	exit ;;
-    9000/[34]??:4.3bsd:1.*:*)
-	echo m68k-hp-bsd
-	exit ;;
-    hp300:4.4BSD:*:* | 9000/[34]??:4.3bsd:2.*:*)
-	echo m68k-hp-bsd4.4
-	exit ;;
-    9000/[34678]??:HP-UX:*:*)
-	HPUX_REV=`echo ${UNAME_RELEASE}|sed -e 's/[^.]*.[0B]*//'`
-	case "${UNAME_MACHINE}" in
-	    9000/31? )            HP_ARCH=m68000 ;;
-	    9000/[34]?? )         HP_ARCH=m68k ;;
-	    9000/[678][0-9][0-9])
-		if [ -x /usr/bin/getconf ]; then
-		    sc_cpu_version=`/usr/bin/getconf SC_CPU_VERSION 2>/dev/null`
-		    sc_kernel_bits=`/usr/bin/getconf SC_KERNEL_BITS 2>/dev/null`
-		    case "${sc_cpu_version}" in
-		      523) HP_ARCH="hppa1.0" ;; # CPU_PA_RISC1_0
-		      528) HP_ARCH="hppa1.1" ;; # CPU_PA_RISC1_1
-		      532)                      # CPU_PA_RISC2_0
-			case "${sc_kernel_bits}" in
-			  32) HP_ARCH="hppa2.0n" ;;
-			  64) HP_ARCH="hppa2.0w" ;;
-			  '') HP_ARCH="hppa2.0" ;;   # HP-UX 10.20
-			esac ;;
-		    esac
-		fi
-		if [ "${HP_ARCH}" = "" ]; then
-		    eval $set_cc_for_build
-		    sed 's/^		//' << EOF >$dummy.c
-
-		#define _HPUX_SOURCE
-		#include <stdlib.h>
-		#include <unistd.h>
-
-		int main ()
-		{
-		#if defined(_SC_KERNEL_BITS)
-		    long bits = sysconf(_SC_KERNEL_BITS);
-		#endif
-		    long cpu  = sysconf (_SC_CPU_VERSION);
-
-		    switch (cpu)
-			{
-			case CPU_PA_RISC1_0: puts ("hppa1.0"); break;
-			case CPU_PA_RISC1_1: puts ("hppa1.1"); break;
-			case CPU_PA_RISC2_0:
-		#if defined(_SC_KERNEL_BITS)
-			    switch (bits)
-				{
-				case 64: puts ("hppa2.0w"); break;
-				case 32: puts ("hppa2.0n"); break;
-				default: puts ("hppa2.0"); break;
-				} break;
-		#else  /* !defined(_SC_KERNEL_BITS) */
-			    puts ("hppa2.0"); break;
-		#endif
-			default: puts ("hppa1.0"); break;
-			}
-		    exit (0);
-		}
-EOF
-		    (CCOPTS= $CC_FOR_BUILD -o $dummy $dummy.c 2>/dev/null) && HP_ARCH=`$dummy`
-		    test -z "$HP_ARCH" && HP_ARCH=hppa
-		fi ;;
-	esac
-	if [ ${HP_ARCH} = "hppa2.0w" ]
-	then
-	    eval $set_cc_for_build
-
-	    # hppa2.0w-hp-hpux* has a 64-bit kernel and a compiler generating
-	    # 32-bit code.  hppa64-hp-hpux* has the same kernel and a compiler
-	    # generating 64-bit code.  GNU and HP use different nomenclature:
-	    #
-	    # $ CC_FOR_BUILD=cc ./config.guess
-	    # => hppa2.0w-hp-hpux11.23
-	    # $ CC_FOR_BUILD="cc +DA2.0w" ./config.guess
-	    # => hppa64-hp-hpux11.23
-
-	    if echo __LP64__ | (CCOPTS= $CC_FOR_BUILD -E - 2>/dev/null) |
-		grep -q __LP64__
-	    then
-		HP_ARCH="hppa2.0w"
-	    else
-		HP_ARCH="hppa64"
-	    fi
-	fi
-	echo ${HP_ARCH}-hp-hpux${HPUX_REV}
-	exit ;;
-    ia64:HP-UX:*:*)
-	HPUX_REV=`echo ${UNAME_RELEASE}|sed -e 's/[^.]*.[0B]*//'`
-	echo ia64-hp-hpux${HPUX_REV}
-	exit ;;
-    3050*:HI-UX:*:*)
-	eval $set_cc_for_build
-	sed 's/^	//' << EOF >$dummy.c
-	#include <unistd.h>
-	int
-	main ()
-	{
-	  long cpu = sysconf (_SC_CPU_VERSION);
-	  /* The order matters, because CPU_IS_HP_MC68K erroneously returns
-	     true for CPU_PA_RISC1_0.  CPU_IS_PA_RISC returns correct
-	     results, however.  */
-	  if (CPU_IS_PA_RISC (cpu))
-	    {
-	      switch (cpu)
-		{
-		  case CPU_PA_RISC1_0: puts ("hppa1.0-hitachi-hiuxwe2"); break;
-		  case CPU_PA_RISC1_1: puts ("hppa1.1-hitachi-hiuxwe2"); break;
-		  case CPU_PA_RISC2_0: puts ("hppa2.0-hitachi-hiuxwe2"); break;
-		  default: puts ("hppa-hitachi-hiuxwe2"); break;
-		}
-	    }
-	  else if (CPU_IS_HP_MC68K (cpu))
-	    puts ("m68k-hitachi-hiuxwe2");
-	  else puts ("unknown-hitachi-hiuxwe2");
-	  exit (0);
-	}
-EOF
-	$CC_FOR_BUILD -o $dummy $dummy.c && SYSTEM_NAME=`$dummy` &&
-		{ echo "$SYSTEM_NAME"; exit; }
-	echo unknown-hitachi-hiuxwe2
-	exit ;;
-    9000/7??:4.3bsd:*:* | 9000/8?[79]:4.3bsd:*:* )
-	echo hppa1.1-hp-bsd
-	exit ;;
-    9000/8??:4.3bsd:*:*)
-	echo hppa1.0-hp-bsd
-	exit ;;
-    *9??*:MPE/iX:*:* | *3000*:MPE/iX:*:*)
-	echo hppa1.0-hp-mpeix
-	exit ;;
-    hp7??:OSF1:*:* | hp8?[79]:OSF1:*:* )
-	echo hppa1.1-hp-osf
-	exit ;;
-    hp8??:OSF1:*:*)
-	echo hppa1.0-hp-osf
-	exit ;;
-    i*86:OSF1:*:*)
-	if [ -x /usr/sbin/sysversion ] ; then
-	    echo ${UNAME_MACHINE}-unknown-osf1mk
-	else
-	    echo ${UNAME_MACHINE}-unknown-osf1
-	fi
-	exit ;;
-    parisc*:Lites*:*:*)
-	echo hppa1.1-hp-lites
-	exit ;;
-    C1*:ConvexOS:*:* | convex:ConvexOS:C1*:*)
-	echo c1-convex-bsd
-	exit ;;
-    C2*:ConvexOS:*:* | convex:ConvexOS:C2*:*)
-	if getsysinfo -f scalar_acc
-	then echo c32-convex-bsd
-	else echo c2-convex-bsd
-	fi
-	exit ;;
-    C34*:ConvexOS:*:* | convex:ConvexOS:C34*:*)
-	echo c34-convex-bsd
-	exit ;;
-    C38*:ConvexOS:*:* | convex:ConvexOS:C38*:*)
-	echo c38-convex-bsd
-	exit ;;
-    C4*:ConvexOS:*:* | convex:ConvexOS:C4*:*)
-	echo c4-convex-bsd
-	exit ;;
-    CRAY*Y-MP:*:*:*)
-	echo ymp-cray-unicos${UNAME_RELEASE} | sed -e 's/\.[^.]*$/.X/'
-	exit ;;
-    CRAY*[A-Z]90:*:*:*)
-	echo ${UNAME_MACHINE}-cray-unicos${UNAME_RELEASE} \
-	| sed -e 's/CRAY.*\([A-Z]90\)/\1/' \
-	      -e y/ABCDEFGHIJKLMNOPQRSTUVWXYZ/abcdefghijklmnopqrstuvwxyz/ \
-	      -e 's/\.[^.]*$/.X/'
-	exit ;;
-    CRAY*TS:*:*:*)
-	echo t90-cray-unicos${UNAME_RELEASE} | sed -e 's/\.[^.]*$/.X/'
-	exit ;;
-    CRAY*T3E:*:*:*)
-	echo alphaev5-cray-unicosmk${UNAME_RELEASE} | sed -e 's/\.[^.]*$/.X/'
-	exit ;;
-    CRAY*SV1:*:*:*)
-	echo sv1-cray-unicos${UNAME_RELEASE} | sed -e 's/\.[^.]*$/.X/'
-	exit ;;
-    *:UNICOS/mp:*:*)
-	echo craynv-cray-unicosmp${UNAME_RELEASE} | sed -e 's/\.[^.]*$/.X/'
-	exit ;;
-    F30[01]:UNIX_System_V:*:* | F700:UNIX_System_V:*:*)
-	FUJITSU_PROC=`uname -m | tr 'ABCDEFGHIJKLMNOPQRSTUVWXYZ' 'abcdefghijklmnopqrstuvwxyz'`
-	FUJITSU_SYS=`uname -p | tr 'ABCDEFGHIJKLMNOPQRSTUVWXYZ' 'abcdefghijklmnopqrstuvwxyz' | sed -e 's/\///'`
-	FUJITSU_REL=`echo ${UNAME_RELEASE} | sed -e 's/ /_/'`
-	echo "${FUJITSU_PROC}-fujitsu-${FUJITSU_SYS}${FUJITSU_REL}"
-	exit ;;
-    5000:UNIX_System_V:4.*:*)
-	FUJITSU_SYS=`uname -p | tr 'ABCDEFGHIJKLMNOPQRSTUVWXYZ' 'abcdefghijklmnopqrstuvwxyz' | sed -e 's/\///'`
-	FUJITSU_REL=`echo ${UNAME_RELEASE} | tr 'ABCDEFGHIJKLMNOPQRSTUVWXYZ' 'abcdefghijklmnopqrstuvwxyz' | sed -e 's/ /_/'`
-	echo "sparc-fujitsu-${FUJITSU_SYS}${FUJITSU_REL}"
-	exit ;;
-    i*86:BSD/386:*:* | i*86:BSD/OS:*:* | *:Ascend\ Embedded/OS:*:*)
-	echo ${UNAME_MACHINE}-pc-bsdi${UNAME_RELEASE}
-	exit ;;
-    sparc*:BSD/OS:*:*)
-	echo sparc-unknown-bsdi${UNAME_RELEASE}
-	exit ;;
-    *:BSD/OS:*:*)
-	echo ${UNAME_MACHINE}-unknown-bsdi${UNAME_RELEASE}
-	exit ;;
-    *:FreeBSD:*:*)
-	UNAME_PROCESSOR=`/usr/bin/uname -p`
-	case ${UNAME_PROCESSOR} in
-	    amd64)
-		echo x86_64-unknown-freebsd`echo ${UNAME_RELEASE}|sed -e 's/[-(].*//'` ;;
-	    *)
-		echo ${UNAME_PROCESSOR}-unknown-freebsd`echo ${UNAME_RELEASE}|sed -e 's/[-(].*//'` ;;
-	esac
-	exit ;;
-    i*:CYGWIN*:*)
-	echo ${UNAME_MACHINE}-pc-cygwin
-	exit ;;
-    *:MINGW*:*)
-	echo ${UNAME_MACHINE}-pc-mingw32
-	exit ;;
-    i*:MSYS*:*)
-	echo ${UNAME_MACHINE}-pc-msys
-	exit ;;
-    i*:windows32*:*)
-	# uname -m includes "-pc" on this system.
-	echo ${UNAME_MACHINE}-mingw32
-	exit ;;
-    i*:PW*:*)
-	echo ${UNAME_MACHINE}-pc-pw32
-	exit ;;
-    *:Interix*:*)
-	case ${UNAME_MACHINE} in
-	    x86)
-		echo i586-pc-interix${UNAME_RELEASE}
-		exit ;;
-	    authenticamd | genuineintel | EM64T)
-		echo x86_64-unknown-interix${UNAME_RELEASE}
-		exit ;;
-	    IA64)
-		echo ia64-unknown-interix${UNAME_RELEASE}
-		exit ;;
-	esac ;;
-    [345]86:Windows_95:* | [345]86:Windows_98:* | [345]86:Windows_NT:*)
-	echo i${UNAME_MACHINE}-pc-mks
-	exit ;;
-    8664:Windows_NT:*)
-	echo x86_64-pc-mks
-	exit ;;
-    i*:Windows_NT*:* | Pentium*:Windows_NT*:*)
-	# How do we know it's Interix rather than the generic POSIX subsystem?
-	# It also conflicts with pre-2.0 versions of AT&T UWIN. Should we
-	# UNAME_MACHINE based on the output of uname instead of i386?
-	echo i586-pc-interix
-	exit ;;
-    i*:UWIN*:*)
-	echo ${UNAME_MACHINE}-pc-uwin
-	exit ;;
-    amd64:CYGWIN*:*:* | x86_64:CYGWIN*:*:*)
-	echo x86_64-unknown-cygwin
-	exit ;;
-    p*:CYGWIN*:*)
-	echo powerpcle-unknown-cygwin
-	exit ;;
-    prep*:SunOS:5.*:*)
-	echo powerpcle-unknown-solaris2`echo ${UNAME_RELEASE}|sed -e 's/[^.]*//'`
-	exit ;;
-    *:GNU:*:*)
-	# the GNU system
-	echo `echo ${UNAME_MACHINE}|sed -e 's,[-/].*$,,'`-unknown-gnu`echo ${UNAME_RELEASE}|sed -e 's,/.*$,,'`
-	exit ;;
-    *:GNU/*:*:*)
-	# other systems with GNU libc and userland
-	echo ${UNAME_MACHINE}-unknown-`echo ${UNAME_SYSTEM} | sed 's,^[^/]*/,,' | tr '[A-Z]' '[a-z]'``echo ${UNAME_RELEASE}|sed -e 's/[-(].*//'`-gnu
-	exit ;;
-    i*86:Minix:*:*)
-	echo ${UNAME_MACHINE}-pc-minix
-	exit ;;
-    alpha:Linux:*:*)
-	case `sed -n '/^cpu model/s/^.*: \(.*\)/\1/p' < /proc/cpuinfo` in
-	  EV5)   UNAME_MACHINE=alphaev5 ;;
-	  EV56)  UNAME_MACHINE=alphaev56 ;;
-	  PCA56) UNAME_MACHINE=alphapca56 ;;
-	  PCA57) UNAME_MACHINE=alphapca56 ;;
-	  EV6)   UNAME_MACHINE=alphaev6 ;;
-	  EV67)  UNAME_MACHINE=alphaev67 ;;
-	  EV68*) UNAME_MACHINE=alphaev68 ;;
-	esac
-	objdump --private-headers /bin/sh | grep -q ld.so.1
-	if test "$?" = 0 ; then LIBC="libc1" ; else LIBC="" ; fi
-	echo ${UNAME_MACHINE}-unknown-linux-gnu${LIBC}
-	exit ;;
-    arm*:Linux:*:*)
-	eval $set_cc_for_build
-	if echo __ARM_EABI__ | $CC_FOR_BUILD -E - 2>/dev/null \
-	    | grep -q __ARM_EABI__
-	then
-	    echo ${UNAME_MACHINE}-unknown-linux-gnu
-	else
-	    if echo __ARM_PCS_VFP | $CC_FOR_BUILD -E - 2>/dev/null \
-		| grep -q __ARM_PCS_VFP
-	    then
-		echo ${UNAME_MACHINE}-unknown-linux-gnueabi
-	    else
-		echo ${UNAME_MACHINE}-unknown-linux-gnueabihf
-	    fi
-	fi
-	exit ;;
-    avr32*:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    cris:Linux:*:*)
-	echo cris-axis-linux-gnu
-	exit ;;
-    crisv32:Linux:*:*)
-	echo crisv32-axis-linux-gnu
-	exit ;;
-    frv:Linux:*:*)
-	echo frv-unknown-linux-gnu
-	exit ;;
-    hexagon:Linux:*:*)
-	echo hexagon-unknown-linux-gnu
-	exit ;;
-    i*86:Linux:*:*)
-	LIBC=gnu
-	eval $set_cc_for_build
-	sed 's/^	//' << EOF >$dummy.c
-	#ifdef __dietlibc__
-	LIBC=dietlibc
-	#endif
-EOF
-	eval `$CC_FOR_BUILD -E $dummy.c 2>/dev/null | grep '^LIBC'`
-	echo "${UNAME_MACHINE}-pc-linux-${LIBC}"
-	exit ;;
-    ia64:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    m32r*:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    m68*:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    mips:Linux:*:* | mips64:Linux:*:*)
-	eval $set_cc_for_build
-	sed 's/^	//' << EOF >$dummy.c
-	#undef CPU
-	#undef ${UNAME_MACHINE}
-	#undef ${UNAME_MACHINE}el
-	#if defined(__MIPSEL__) || defined(__MIPSEL) || defined(_MIPSEL) || defined(MIPSEL)
-	CPU=${UNAME_MACHINE}el
-	#else
-	#if defined(__MIPSEB__) || defined(__MIPSEB) || defined(_MIPSEB) || defined(MIPSEB)
-	CPU=${UNAME_MACHINE}
-	#else
-	CPU=
-	#endif
-	#endif
-EOF
-	eval `$CC_FOR_BUILD -E $dummy.c 2>/dev/null | grep '^CPU'`
-	test x"${CPU}" != x && { echo "${CPU}-unknown-linux-gnu"; exit; }
-	;;
-    or32:Linux:*:*)
-	echo or32-unknown-linux-gnu
-	exit ;;
-    padre:Linux:*:*)
-	echo sparc-unknown-linux-gnu
-	exit ;;
-    parisc64:Linux:*:* | hppa64:Linux:*:*)
-	echo hppa64-unknown-linux-gnu
-	exit ;;
-    parisc:Linux:*:* | hppa:Linux:*:*)
-	# Look for CPU level
-	case `grep '^cpu[^a-z]*:' /proc/cpuinfo 2>/dev/null | cut -d' ' -f2` in
-	  PA7*) echo hppa1.1-unknown-linux-gnu ;;
-	  PA8*) echo hppa2.0-unknown-linux-gnu ;;
-	  *)    echo hppa-unknown-linux-gnu ;;
-	esac
-	exit ;;
-    ppc64:Linux:*:*)
-	echo powerpc64-unknown-linux-gnu
-	exit ;;
-    ppc:Linux:*:*)
-	echo powerpc-unknown-linux-gnu
-	exit ;;
-    s390:Linux:*:* | s390x:Linux:*:*)
-	echo ${UNAME_MACHINE}-ibm-linux
-	exit ;;
-    sh64*:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    sh*:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    sparc:Linux:*:* | sparc64:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    tile*:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    vax:Linux:*:*)
-	echo ${UNAME_MACHINE}-dec-linux-gnu
-	exit ;;
-    x86_64:Linux:*:*)
-	echo x86_64-unknown-linux-gnu
-	exit ;;
-    xtensa*:Linux:*:*)
-	echo ${UNAME_MACHINE}-unknown-linux-gnu
-	exit ;;
-    i*86:DYNIX/ptx:4*:*)
-	# ptx 4.0 does uname -s correctly, with DYNIX/ptx in there.
-	# earlier versions are messed up and put the nodename in both
-	# sysname and nodename.
-	echo i386-sequent-sysv4
-	exit ;;
-    i*86:UNIX_SV:4.2MP:2.*)
-	# Unixware is an offshoot of SVR4, but it has its own version
-	# number series starting with 2...
-	# I am not positive that other SVR4 systems won't match this,
-	# I just have to hope.  -- rms.
-	# Use sysv4.2uw... so that sysv4* matches it.
-	echo ${UNAME_MACHINE}-pc-sysv4.2uw${UNAME_VERSION}
-	exit ;;
-    i*86:OS/2:*:*)
-	# If we were able to find `uname', then EMX Unix compatibility
-	# is probably installed.
-	echo ${UNAME_MACHINE}-pc-os2-emx
-	exit ;;
-    i*86:XTS-300:*:STOP)
-	echo ${UNAME_MACHINE}-unknown-stop
-	exit ;;
-    i*86:atheos:*:*)
-	echo ${UNAME_MACHINE}-unknown-atheos
-	exit ;;
-    i*86:syllable:*:*)
-	echo ${UNAME_MACHINE}-pc-syllable
-	exit ;;
-    i*86:LynxOS:2.*:* | i*86:LynxOS:3.[01]*:* | i*86:LynxOS:4.[02]*:*)
-	echo i386-unknown-lynxos${UNAME_RELEASE}
-	exit ;;
-    i*86:*DOS:*:*)
-	echo ${UNAME_MACHINE}-pc-msdosdjgpp
-	exit ;;
-    i*86:*:4.*:* | i*86:SYSTEM_V:4.*:*)
-	UNAME_REL=`echo ${UNAME_RELEASE} | sed 's/\/MP$//'`
-	if grep Novell /usr/include/link.h >/dev/null 2>/dev/null; then
-		echo ${UNAME_MACHINE}-univel-sysv${UNAME_REL}
-	else
-		echo ${UNAME_MACHINE}-pc-sysv${UNAME_REL}
-	fi
-	exit ;;
-    i*86:*:5:[678]*)
-	# UnixWare 7.x, OpenUNIX and OpenServer 6.
-	case `/bin/uname -X | grep "^Machine"` in
-	    *486*)	     UNAME_MACHINE=i486 ;;
-	    *Pentium)	     UNAME_MACHINE=i586 ;;
-	    *Pent*|*Celeron) UNAME_MACHINE=i686 ;;
-	esac
-	echo ${UNAME_MACHINE}-unknown-sysv${UNAME_RELEASE}${UNAME_SYSTEM}${UNAME_VERSION}
-	exit ;;
-    i*86:*:3.2:*)
-	if test -f /usr/options/cb.name; then
-		UNAME_REL=`sed -n 's/.*Version //p' </usr/options/cb.name`
-		echo ${UNAME_MACHINE}-pc-isc$UNAME_REL
-	elif /bin/uname -X 2>/dev/null >/dev/null ; then
-		UNAME_REL=`(/bin/uname -X|grep Release|sed -e 's/.*= //')`
-		(/bin/uname -X|grep i80486 >/dev/null) && UNAME_MACHINE=i486
-		(/bin/uname -X|grep '^Machine.*Pentium' >/dev/null) \
-			&& UNAME_MACHINE=i586
-		(/bin/uname -X|grep '^Machine.*Pent *II' >/dev/null) \
-			&& UNAME_MACHINE=i686
-		(/bin/uname -X|grep '^Machine.*Pentium Pro' >/dev/null) \
-			&& UNAME_MACHINE=i686
-		echo ${UNAME_MACHINE}-pc-sco$UNAME_REL
-	else
-		echo ${UNAME_MACHINE}-pc-sysv32
-	fi
-	exit ;;
-    pc:*:*:*)
-	# Left here for compatibility:
-	# uname -m prints for DJGPP always 'pc', but it prints nothing about
-	# the processor, so we play safe by assuming i586.
-	# Note: whatever this is, it MUST be the same as what config.sub
-	# prints for the "djgpp" host, or else GDB configury will decide that
-	# this is a cross-build.
-	echo i586-pc-msdosdjgpp
-	exit ;;
-    Intel:Mach:3*:*)
-	echo i386-pc-mach3
-	exit ;;
-    paragon:*:*:*)
-	echo i860-intel-osf1
-	exit ;;
-    i860:*:4.*:*) # i860-SVR4
-	if grep Stardent /usr/include/sys/uadmin.h >/dev/null 2>&1 ; then
-	  echo i860-stardent-sysv${UNAME_RELEASE} # Stardent Vistra i860-SVR4
-	else # Add other i860-SVR4 vendors below as they are discovered.
-	  echo i860-unknown-sysv${UNAME_RELEASE}  # Unknown i860-SVR4
-	fi
-	exit ;;
-    mini*:CTIX:SYS*5:*)
-	# "miniframe"
-	echo m68010-convergent-sysv
-	exit ;;
-    mc68k:UNIX:SYSTEM5:3.51m)
-	echo m68k-convergent-sysv
-	exit ;;
-    M680?0:D-NIX:5.3:*)
-	echo m68k-diab-dnix
-	exit ;;
-    M68*:*:R3V[5678]*:*)
-	test -r /sysV68 && { echo 'm68k-motorola-sysv'; exit; } ;;
-    3[345]??:*:4.0:3.0 | 3[34]??A:*:4.0:3.0 | 3[34]??,*:*:4.0:3.0 | 3[34]??/*:*:4.0:3.0 | 4400:*:4.0:3.0 | 4850:*:4.0:3.0 | SKA40:*:4.0:3.0 | SDS2:*:4.0:3.0 | SHG2:*:4.0:3.0 | S7501*:*:4.0:3.0)
-	OS_REL=''
-	test -r /etc/.relid \
-	&& OS_REL=.`sed -n 's/[^ ]* [^ ]* \([0-9][0-9]\).*/\1/p' < /etc/.relid`
-	/bin/uname -p 2>/dev/null | grep 86 >/dev/null \
-	  && { echo i486-ncr-sysv4.3${OS_REL}; exit; }
-	/bin/uname -p 2>/dev/null | /bin/grep entium >/dev/null \
-	  && { echo i586-ncr-sysv4.3${OS_REL}; exit; } ;;
-    3[34]??:*:4.0:* | 3[34]??,*:*:4.0:*)
-	/bin/uname -p 2>/dev/null | grep 86 >/dev/null \
-	  && { echo i486-ncr-sysv4; exit; } ;;
-    NCR*:*:4.2:* | MPRAS*:*:4.2:*)
-	OS_REL='.3'
-	test -r /etc/.relid \
-	    && OS_REL=.`sed -n 's/[^ ]* [^ ]* \([0-9][0-9]\).*/\1/p' < /etc/.relid`
-	/bin/uname -p 2>/dev/null | grep 86 >/dev/null \
-	    && { echo i486-ncr-sysv4.3${OS_REL}; exit; }
-	/bin/uname -p 2>/dev/null | /bin/grep entium >/dev/null \
-	    && { echo i586-ncr-sysv4.3${OS_REL}; exit; }
-	/bin/uname -p 2>/dev/null | /bin/grep pteron >/dev/null \
-	    && { echo i586-ncr-sysv4.3${OS_REL}; exit; } ;;
-    m68*:LynxOS:2.*:* | m68*:LynxOS:3.0*:*)
-	echo m68k-unknown-lynxos${UNAME_RELEASE}
-	exit ;;
-    mc68030:UNIX_System_V:4.*:*)
-	echo m68k-atari-sysv4
-	exit ;;
-    TSUNAMI:LynxOS:2.*:*)
-	echo sparc-unknown-lynxos${UNAME_RELEASE}
-	exit ;;
-    rs6000:LynxOS:2.*:*)
-	echo rs6000-unknown-lynxos${UNAME_RELEASE}
-	exit ;;
-    PowerPC:LynxOS:2.*:* | PowerPC:LynxOS:3.[01]*:* | PowerPC:LynxOS:4.[02]*:*)
-	echo powerpc-unknown-lynxos${UNAME_RELEASE}
-	exit ;;
-    SM[BE]S:UNIX_SV:*:*)
-	echo mips-dde-sysv${UNAME_RELEASE}
-	exit ;;
-    RM*:ReliantUNIX-*:*:*)
-	echo mips-sni-sysv4
-	exit ;;
-    RM*:SINIX-*:*:*)
-	echo mips-sni-sysv4
-	exit ;;
-    *:SINIX-*:*:*)
-	if uname -p 2>/dev/null >/dev/null ; then
-		UNAME_MACHINE=`(uname -p) 2>/dev/null`
-		echo ${UNAME_MACHINE}-sni-sysv4
-	else
-		echo ns32k-sni-sysv
-	fi
-	exit ;;
-    PENTIUM:*:4.0*:*)	# Unisys `ClearPath HMP IX 4000' SVR4/MP effort
-			# says <Richard.M.Bartel@ccMail.Census.GOV>
-	echo i586-unisys-sysv4
-	exit ;;
-    *:UNIX_System_V:4*:FTX*)
-	# From Gerald Hewes <hewes@openmarket.com>.
-	# How about differentiating between stratus architectures? -djm
-	echo hppa1.1-stratus-sysv4
-	exit ;;
-    *:*:*:FTX*)
-	# From seanf@swdc.stratus.com.
-	echo i860-stratus-sysv4
-	exit ;;
-    i*86:VOS:*:*)
-	# From Paul.Green@stratus.com.
-	echo ${UNAME_MACHINE}-stratus-vos
-	exit ;;
-    *:VOS:*:*)
-	# From Paul.Green@stratus.com.
-	echo hppa1.1-stratus-vos
-	exit ;;
-    mc68*:A/UX:*:*)
-	echo m68k-apple-aux${UNAME_RELEASE}
-	exit ;;
-    news*:NEWS-OS:6*:*)
-	echo mips-sony-newsos6
-	exit ;;
-    R[34]000:*System_V*:*:* | R4000:UNIX_SYSV:*:* | R*000:UNIX_SV:*:*)
-	if [ -d /usr/nec ]; then
-		echo mips-nec-sysv${UNAME_RELEASE}
-	else
-		echo mips-unknown-sysv${UNAME_RELEASE}
-	fi
-	exit ;;
-    BeBox:BeOS:*:*)	# BeOS running on hardware made by Be, PPC only.
-	echo powerpc-be-beos
-	exit ;;
-    BeMac:BeOS:*:*)	# BeOS running on Mac or Mac clone, PPC only.
-	echo powerpc-apple-beos
-	exit ;;
-    BePC:BeOS:*:*)	# BeOS running on Intel PC compatible.
-	echo i586-pc-beos
-	exit ;;
-    BePC:Haiku:*:*)	# Haiku running on Intel PC compatible.
-	echo i586-pc-haiku
-	exit ;;
-    SX-4:SUPER-UX:*:*)
-	echo sx4-nec-superux${UNAME_RELEASE}
-	exit ;;
-    SX-5:SUPER-UX:*:*)
-	echo sx5-nec-superux${UNAME_RELEASE}
-	exit ;;
-    SX-6:SUPER-UX:*:*)
-	echo sx6-nec-superux${UNAME_RELEASE}
-	exit ;;
-    SX-7:SUPER-UX:*:*)
-	echo sx7-nec-superux${UNAME_RELEASE}
-	exit ;;
-    SX-8:SUPER-UX:*:*)
-	echo sx8-nec-superux${UNAME_RELEASE}
-	exit ;;
-    SX-8R:SUPER-UX:*:*)
-	echo sx8r-nec-superux${UNAME_RELEASE}
-	exit ;;
-    Power*:Rhapsody:*:*)
-	echo powerpc-apple-rhapsody${UNAME_RELEASE}
-	exit ;;
-    *:Rhapsody:*:*)
-	echo ${UNAME_MACHINE}-apple-rhapsody${UNAME_RELEASE}
-	exit ;;
-    *:Darwin:*:*)
-	UNAME_PROCESSOR=`uname -p` || UNAME_PROCESSOR=unknown
-	case $UNAME_PROCESSOR in
-	    i386)
-		eval $set_cc_for_build
-		if [ "$CC_FOR_BUILD" != 'no_compiler_found' ]; then
-		  if (echo '#ifdef __LP64__'; echo IS_64BIT_ARCH; echo '#endif') | \
-		      (CCOPTS= $CC_FOR_BUILD -E - 2>/dev/null) | \
-		      grep IS_64BIT_ARCH >/dev/null
-		  then
-		      UNAME_PROCESSOR="x86_64"
-		  fi
-		fi ;;
-	    unknown) UNAME_PROCESSOR=powerpc ;;
-	esac
-	echo ${UNAME_PROCESSOR}-apple-darwin${UNAME_RELEASE}
-	exit ;;
-    *:procnto*:*:* | *:QNX:[0123456789]*:*)
-	UNAME_PROCESSOR=`uname -p`
-	if test "$UNAME_PROCESSOR" = "x86"; then
-		UNAME_PROCESSOR=i386
-		UNAME_MACHINE=pc
-	fi
-	echo ${UNAME_PROCESSOR}-${UNAME_MACHINE}-nto-qnx${UNAME_RELEASE}
-	exit ;;
-    *:QNX:*:4*)
-	echo i386-pc-qnx
-	exit ;;
-    NEO-?:NONSTOP_KERNEL:*:*)
-	echo neo-tandem-nsk${UNAME_RELEASE}
-	exit ;;
-    NSE-?:NONSTOP_KERNEL:*:*)
-	echo nse-tandem-nsk${UNAME_RELEASE}
-	exit ;;
-    NSR-?:NONSTOP_KERNEL:*:*)
-	echo nsr-tandem-nsk${UNAME_RELEASE}
-	exit ;;
-    *:NonStop-UX:*:*)
-	echo mips-compaq-nonstopux
-	exit ;;
-    BS2000:POSIX*:*:*)
-	echo bs2000-siemens-sysv
-	exit ;;
-    DS/*:UNIX_System_V:*:*)
-	echo ${UNAME_MACHINE}-${UNAME_SYSTEM}-${UNAME_RELEASE}
-	exit ;;
-    *:Plan9:*:*)
-	# "uname -m" is not consistent, so use $cputype instead. 386
-	# is converted to i386 for consistency with other x86
-	# operating systems.
-	if test "$cputype" = "386"; then
-	    UNAME_MACHINE=i386
-	else
-	    UNAME_MACHINE="$cputype"
-	fi
-	echo ${UNAME_MACHINE}-unknown-plan9
-	exit ;;
-    *:TOPS-10:*:*)
-	echo pdp10-unknown-tops10
-	exit ;;
-    *:TENEX:*:*)
-	echo pdp10-unknown-tenex
-	exit ;;
-    KS10:TOPS-20:*:* | KL10:TOPS-20:*:* | TYPE4:TOPS-20:*:*)
-	echo pdp10-dec-tops20
-	exit ;;
-    XKL-1:TOPS-20:*:* | TYPE5:TOPS-20:*:*)
-	echo pdp10-xkl-tops20
-	exit ;;
-    *:TOPS-20:*:*)
-	echo pdp10-unknown-tops20
-	exit ;;
-    *:ITS:*:*)
-	echo pdp10-unknown-its
-	exit ;;
-    SEI:*:*:SEIUX)
-	echo mips-sei-seiux${UNAME_RELEASE}
-	exit ;;
-    *:DragonFly:*:*)
-	echo ${UNAME_MACHINE}-unknown-dragonfly`echo ${UNAME_RELEASE}|sed -e 's/[-(].*//'`
-	exit ;;
-    *:*VMS:*:*)
-	UNAME_MACHINE=`(uname -p) 2>/dev/null`
-	case "${UNAME_MACHINE}" in
-	    A*) echo alpha-dec-vms ; exit ;;
-	    I*) echo ia64-dec-vms ; exit ;;
-	    V*) echo vax-dec-vms ; exit ;;
-	esac ;;
-    *:XENIX:*:SysV)
-	echo i386-pc-xenix
-	exit ;;
-    i*86:skyos:*:*)
-	echo ${UNAME_MACHINE}-pc-skyos`echo ${UNAME_RELEASE}` | sed -e 's/ .*$//'
-	exit ;;
-    i*86:rdos:*:*)
-	echo ${UNAME_MACHINE}-pc-rdos
-	exit ;;
-    i*86:AROS:*:*)
-	echo ${UNAME_MACHINE}-pc-aros
-	exit ;;
-esac
-
-#echo '(No uname command or uname output not recognized.)' 1>&2
-#echo "${UNAME_MACHINE}:${UNAME_SYSTEM}:${UNAME_RELEASE}:${UNAME_VERSION}" 1>&2
-
-eval $set_cc_for_build
-cat >$dummy.c <<EOF
-#ifdef _SEQUENT_
-# include <sys/types.h>
-# include <sys/utsname.h>
-#endif
-main ()
-{
-#if defined (sony)
-#if defined (MIPSEB)
-  /* BFD wants "bsd" instead of "newsos".  Perhaps BFD should be changed,
-     I don't know....  */
-  printf ("mips-sony-bsd\n"); exit (0);
-#else
-#include <sys/param.h>
-  printf ("m68k-sony-newsos%s\n",
-#ifdef NEWSOS4
-	"4"
-#else
-	""
-#endif
-	); exit (0);
-#endif
-#endif
-
-#if defined (__arm) && defined (__acorn) && defined (__unix)
-  printf ("arm-acorn-riscix\n"); exit (0);
-#endif
-
-#if defined (hp300) && !defined (hpux)
-  printf ("m68k-hp-bsd\n"); exit (0);
-#endif
-
-#if defined (NeXT)
-#if !defined (__ARCHITECTURE__)
-#define __ARCHITECTURE__ "m68k"
-#endif
-  int version;
-  version=`(hostinfo | sed -n 's/.*NeXT Mach \([0-9]*\).*/\1/p') 2>/dev/null`;
-  if (version < 4)
-    printf ("%s-next-nextstep%d\n", __ARCHITECTURE__, version);
-  else
-    printf ("%s-next-openstep%d\n", __ARCHITECTURE__, version);
-  exit (0);
-#endif
-
-#if defined (MULTIMAX) || defined (n16)
-#if defined (UMAXV)
-  printf ("ns32k-encore-sysv\n"); exit (0);
-#else
-#if defined (CMU)
-  printf ("ns32k-encore-mach\n"); exit (0);
-#else
-  printf ("ns32k-encore-bsd\n"); exit (0);
-#endif
-#endif
-#endif
-
-#if defined (__386BSD__)
-  printf ("i386-pc-bsd\n"); exit (0);
-#endif
-
-#if defined (sequent)
-#if defined (i386)
-  printf ("i386-sequent-dynix\n"); exit (0);
-#endif
-#if defined (ns32000)
-  printf ("ns32k-sequent-dynix\n"); exit (0);
-#endif
-#endif
-
-#if defined (_SEQUENT_)
-    struct utsname un;
-
-    uname(&un);
-
-    if (strncmp(un.version, "V2", 2) == 0) {
-	printf ("i386-sequent-ptx2\n"); exit (0);
-    }
-    if (strncmp(un.version, "V1", 2) == 0) { /* XXX is V1 correct? */
-	printf ("i386-sequent-ptx1\n"); exit (0);
-    }
-    printf ("i386-sequent-ptx\n"); exit (0);
-
-#endif
-
-#if defined (vax)
-# if !defined (ultrix)
-#  include <sys/param.h>
-#  if defined (BSD)
-#   if BSD == 43
-      printf ("vax-dec-bsd4.3\n"); exit (0);
-#   else
-#    if BSD == 199006
-      printf ("vax-dec-bsd4.3reno\n"); exit (0);
-#    else
-      printf ("vax-dec-bsd\n"); exit (0);
-#    endif
-#   endif
-#  else
-    printf ("vax-dec-bsd\n"); exit (0);
-#  endif
-# else
-    printf ("vax-dec-ultrix\n"); exit (0);
-# endif
-#endif
-
-#if defined (alliant) && defined (i860)
-  printf ("i860-alliant-bsd\n"); exit (0);
-#endif
-
-  exit (1);
-}
-EOF
-
-$CC_FOR_BUILD -o $dummy $dummy.c 2>/dev/null && SYSTEM_NAME=`$dummy` &&
-	{ echo "$SYSTEM_NAME"; exit; }
-
-# Apollos put the system type in the environment.
-
-test -d /usr/apollo && { echo ${ISP}-apollo-${SYSTYPE}; exit; }
-
-# Convex versions that predate uname can use getsysinfo(1)
-
-if [ -x /usr/convex/getsysinfo ]
-then
-    case `getsysinfo -f cpu_type` in
-    c1*)
-	echo c1-convex-bsd
-	exit ;;
-    c2*)
-	if getsysinfo -f scalar_acc
-	then echo c32-convex-bsd
-	else echo c2-convex-bsd
-	fi
-	exit ;;
-    c34*)
-	echo c34-convex-bsd
-	exit ;;
-    c38*)
-	echo c38-convex-bsd
-	exit ;;
-    c4*)
-	echo c4-convex-bsd
-	exit ;;
-    esac
-fi
-
-cat >&2 <<EOF
-$0: unable to guess system type
-
-This script, last modified $timestamp, has failed to recognize
-the operating system you are using. It is advised that you
-download the most up to date version of the config scripts from
-
-  http://git.savannah.gnu.org/gitweb/?p=config.git;a=blob_plain;f=config.guess;hb=HEAD
-and
-  http://git.savannah.gnu.org/gitweb/?p=config.git;a=blob_plain;f=config.sub;hb=HEAD
-
-If the version you run ($0) is already up to date, please
-send the following data and any information you think might be
-pertinent to <config-patches@gnu.org> in order to provide the needed
-information to handle your system.
-
-config.guess timestamp = $timestamp
-
-uname -m = `(uname -m) 2>/dev/null || echo unknown`
-uname -r = `(uname -r) 2>/dev/null || echo unknown`
-uname -s = `(uname -s) 2>/dev/null || echo unknown`
-uname -v = `(uname -v) 2>/dev/null || echo unknown`
-
-/usr/bin/uname -p = `(/usr/bin/uname -p) 2>/dev/null`
-/bin/uname -X     = `(/bin/uname -X) 2>/dev/null`
-
-hostinfo               = `(hostinfo) 2>/dev/null`
-/bin/universe          = `(/bin/universe) 2>/dev/null`
-/usr/bin/arch -k       = `(/usr/bin/arch -k) 2>/dev/null`
-/bin/arch              = `(/bin/arch) 2>/dev/null`
-/usr/bin/oslevel       = `(/usr/bin/oslevel) 2>/dev/null`
-/usr/convex/getsysinfo = `(/usr/convex/getsysinfo) 2>/dev/null`
-
-UNAME_MACHINE = ${UNAME_MACHINE}
-UNAME_RELEASE = ${UNAME_RELEASE}
-UNAME_SYSTEM  = ${UNAME_SYSTEM}
-UNAME_VERSION = ${UNAME_VERSION}
-EOF
-
-exit 1
-
-# Local variables:
-# eval: (add-hook 'write-file-hooks 'time-stamp)
-# time-stamp-start: "timestamp='"
-# time-stamp-format: "%:y-%02m-%02d"
-# time-stamp-end: "'"
-# End:
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/config.sub b/sandbox/hurwitz.kroeker/src/float/cnf/config.sub
deleted file mode 100755
index e76eaf4..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/config.sub
+++ /dev/null
@@ -1,1771 +0,0 @@
-#! /bin/sh
-# Configuration validation subroutine script.
-#   Copyright (C) 1992, 1993, 1994, 1995, 1996, 1997, 1998, 1999,
-#   2000, 2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008, 2009, 2010,
-#   2011 Free Software Foundation, Inc.
-
-timestamp='2011-11-11'
-
-# This file is (in principle) common to ALL GNU software.
-# The presence of a machine in this file suggests that SOME GNU software
-# can handle that machine.  It does not imply ALL GNU software can.
-#
-# This file is free software; you can redistribute it and/or modify
-# it under the terms of the GNU General Public License as published by
-# the Free Software Foundation; either version 2 of the License, or
-# (at your option) any later version.
-#
-# This program is distributed in the hope that it will be useful,
-# but WITHOUT ANY WARRANTY; without even the implied warranty of
-# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
-# GNU General Public License for more details.
-#
-# You should have received a copy of the GNU General Public License
-# along with this program; if not, write to the Free Software
-# Foundation, Inc., 51 Franklin Street - Fifth Floor, Boston, MA
-# 02110-1301, USA.
-#
-# As a special exception to the GNU General Public License, if you
-# distribute this file as part of a program that contains a
-# configuration script generated by Autoconf, you may include it under
-# the same distribution terms that you use for the rest of that program.
-
-
-# Please send patches to <config-patches@gnu.org>.  Submit a context
-# diff and a properly formatted GNU ChangeLog entry.
-#
-# Configuration subroutine to validate and canonicalize a configuration type.
-# Supply the specified configuration type as an argument.
-# If it is invalid, we print an error message on stderr and exit with code 1.
-# Otherwise, we print the canonical config type on stdout and succeed.
-
-# You can get the latest version of this script from:
-# http://git.savannah.gnu.org/gitweb/?p=config.git;a=blob_plain;f=config.sub;hb=HEAD
-
-# This file is supposed to be the same for all GNU packages
-# and recognize all the CPU types, system types and aliases
-# that are meaningful with *any* GNU software.
-# Each package is responsible for reporting which valid configurations
-# it does not support.  The user should be able to distinguish
-# a failure to support a valid configuration from a meaningless
-# configuration.
-
-# The goal of this file is to map all the various variations of a given
-# machine specification into a single specification in the form:
-#	CPU_TYPE-MANUFACTURER-OPERATING_SYSTEM
-# or in some cases, the newer four-part form:
-#	CPU_TYPE-MANUFACTURER-KERNEL-OPERATING_SYSTEM
-# It is wrong to echo any other type of specification.
-
-me=`echo "$0" | sed -e 's,.*/,,'`
-
-usage="\
-Usage: $0 [OPTION] CPU-MFR-OPSYS
-       $0 [OPTION] ALIAS
-
-Canonicalize a configuration name.
-
-Operation modes:
-  -h, --help         print this help, then exit
-  -t, --time-stamp   print date of last modification, then exit
-  -v, --version      print version number, then exit
-
-Report bugs and patches to <config-patches@gnu.org>."
-
-version="\
-GNU config.sub ($timestamp)
-
-Copyright (C) 1992, 1993, 1994, 1995, 1996, 1997, 1998, 1999, 2000,
-2001, 2002, 2003, 2004, 2005, 2006, 2007, 2008, 2009, 2010, 2011 Free
-Software Foundation, Inc.
-
-This is free software; see the source for copying conditions.  There is NO
-warranty; not even for MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE."
-
-help="
-Try \`$me --help' for more information."
-
-# Parse command line
-while test $# -gt 0 ; do
-  case $1 in
-    --time-stamp | --time* | -t )
-       echo "$timestamp" ; exit ;;
-    --version | -v )
-       echo "$version" ; exit ;;
-    --help | --h* | -h )
-       echo "$usage"; exit ;;
-    -- )     # Stop option processing
-       shift; break ;;
-    - )	# Use stdin as input.
-       break ;;
-    -* )
-       echo "$me: invalid option $1$help"
-       exit 1 ;;
-
-    *local*)
-       # First pass through any local machine types.
-       echo $1
-       exit ;;
-
-    * )
-       break ;;
-  esac
-done
-
-case $# in
- 0) echo "$me: missing argument$help" >&2
-    exit 1;;
- 1) ;;
- *) echo "$me: too many arguments$help" >&2
-    exit 1;;
-esac
-
-# Separate what the user gave into CPU-COMPANY and OS or KERNEL-OS (if any).
-# Here we must recognize all the valid KERNEL-OS combinations.
-maybe_os=`echo $1 | sed 's/^\(.*\)-\([^-]*-[^-]*\)$/\2/'`
-case $maybe_os in
-  nto-qnx* | linux-gnu* | linux-android* | linux-dietlibc | linux-newlib* | \
-  linux-uclibc* | uclinux-uclibc* | uclinux-gnu* | kfreebsd*-gnu* | \
-  knetbsd*-gnu* | netbsd*-gnu* | \
-  kopensolaris*-gnu* | \
-  storm-chaos* | os2-emx* | rtmk-nova*)
-    os=-$maybe_os
-    basic_machine=`echo $1 | sed 's/^\(.*\)-\([^-]*-[^-]*\)$/\1/'`
-    ;;
-  *)
-    basic_machine=`echo $1 | sed 's/-[^-]*$//'`
-    if [ $basic_machine != $1 ]
-    then os=`echo $1 | sed 's/.*-/-/'`
-    else os=; fi
-    ;;
-esac
-
-### Let's recognize common machines as not being operating systems so
-### that things like config.sub decstation-3100 work.  We also
-### recognize some manufacturers as not being operating systems, so we
-### can provide default operating systems below.
-case $os in
-	-sun*os*)
-		# Prevent following clause from handling this invalid input.
-		;;
-	-dec* | -mips* | -sequent* | -encore* | -pc532* | -sgi* | -sony* | \
-	-att* | -7300* | -3300* | -delta* | -motorola* | -sun[234]* | \
-	-unicom* | -ibm* | -next | -hp | -isi* | -apollo | -altos* | \
-	-convergent* | -ncr* | -news | -32* | -3600* | -3100* | -hitachi* |\
-	-c[123]* | -convex* | -sun | -crds | -omron* | -dg | -ultra | -tti* | \
-	-harris | -dolphin | -highlevel | -gould | -cbm | -ns | -masscomp | \
-	-apple | -axis | -knuth | -cray | -microblaze)
-		os=
-		basic_machine=$1
-		;;
-	-bluegene*)
-		os=-cnk
-		;;
-	-sim | -cisco | -oki | -wec | -winbond)
-		os=
-		basic_machine=$1
-		;;
-	-scout)
-		;;
-	-wrs)
-		os=-vxworks
-		basic_machine=$1
-		;;
-	-chorusos*)
-		os=-chorusos
-		basic_machine=$1
-		;;
-	-chorusrdb)
-		os=-chorusrdb
-		basic_machine=$1
-		;;
-	-hiux*)
-		os=-hiuxwe2
-		;;
-	-sco6)
-		os=-sco5v6
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-sco5)
-		os=-sco3.2v5
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-sco4)
-		os=-sco3.2v4
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-sco3.2.[4-9]*)
-		os=`echo $os | sed -e 's/sco3.2./sco3.2v/'`
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-sco3.2v[4-9]*)
-		# Don't forget version if it is 3.2v4 or newer.
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-sco5v6*)
-		# Don't forget version if it is 3.2v4 or newer.
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-sco*)
-		os=-sco3.2v2
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-udk*)
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-isc)
-		os=-isc2.2
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-clix*)
-		basic_machine=clipper-intergraph
-		;;
-	-isc*)
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-pc/'`
-		;;
-	-lynx*)
-		os=-lynxos
-		;;
-	-ptx*)
-		basic_machine=`echo $1 | sed -e 's/86-.*/86-sequent/'`
-		;;
-	-windowsnt*)
-		os=`echo $os | sed -e 's/windowsnt/winnt/'`
-		;;
-	-psos*)
-		os=-psos
-		;;
-	-mint | -mint[0-9]*)
-		basic_machine=m68k-atari
-		os=-mint
-		;;
-esac
-
-# Decode aliases for certain CPU-COMPANY combinations.
-case $basic_machine in
-	# Recognize the basic CPU types without company name.
-	# Some are omitted here because they have special meanings below.
-	1750a | 580 \
-	| a29k \
-	| alpha | alphaev[4-8] | alphaev56 | alphaev6[78] | alphapca5[67] \
-	| alpha64 | alpha64ev[4-8] | alpha64ev56 | alpha64ev6[78] | alpha64pca5[67] \
-	| am33_2.0 \
-	| arc | arm | arm[bl]e | arme[lb] | armv[2345] | armv[345][lb] | avr | avr32 \
-        | be32 | be64 \
-	| bfin \
-	| c4x | clipper \
-	| d10v | d30v | dlx | dsp16xx \
-	| epiphany \
-	| fido | fr30 | frv \
-	| h8300 | h8500 | hppa | hppa1.[01] | hppa2.0 | hppa2.0[nw] | hppa64 \
-	| hexagon \
-	| i370 | i860 | i960 | ia64 \
-	| ip2k | iq2000 \
-	| le32 | le64 \
-	| lm32 \
-	| m32c | m32r | m32rle | m68000 | m68k | m88k \
-	| maxq | mb | microblaze | mcore | mep | metag \
-	| mips | mipsbe | mipseb | mipsel | mipsle \
-	| mips16 \
-	| mips64 | mips64el \
-	| mips64octeon | mips64octeonel \
-	| mips64orion | mips64orionel \
-	| mips64r5900 | mips64r5900el \
-	| mips64vr | mips64vrel \
-	| mips64vr4100 | mips64vr4100el \
-	| mips64vr4300 | mips64vr4300el \
-	| mips64vr5000 | mips64vr5000el \
-	| mips64vr5900 | mips64vr5900el \
-	| mipsisa32 | mipsisa32el \
-	| mipsisa32r2 | mipsisa32r2el \
-	| mipsisa64 | mipsisa64el \
-	| mipsisa64r2 | mipsisa64r2el \
-	| mipsisa64sb1 | mipsisa64sb1el \
-	| mipsisa64sr71k | mipsisa64sr71kel \
-	| mipstx39 | mipstx39el \
-	| mn10200 | mn10300 \
-	| moxie \
-	| mt \
-	| msp430 \
-	| nds32 | nds32le | nds32be \
-	| nios | nios2 \
-	| ns16k | ns32k \
-	| open8 \
-	| or32 \
-	| pdp10 | pdp11 | pj | pjl \
-	| powerpc | powerpc64 | powerpc64le | powerpcle \
-	| pyramid \
-	| rl78 | rx \
-	| score \
-	| sh | sh[1234] | sh[24]a | sh[24]aeb | sh[23]e | sh[34]eb | sheb | shbe | shle | sh[1234]le | sh3ele \
-	| sh64 | sh64le \
-	| sparc | sparc64 | sparc64b | sparc64v | sparc86x | sparclet | sparclite \
-	| sparcv8 | sparcv9 | sparcv9b | sparcv9v \
-	| spu \
-	| tahoe | tic4x | tic54x | tic55x | tic6x | tic80 | tron \
-	| ubicom32 \
-	| v850 | v850e | v850e1 | v850e2 | v850es | v850e2v3 \
-	| we32k \
-	| x86 | xc16x | xstormy16 | xtensa \
-	| z8k | z80)
-		basic_machine=$basic_machine-unknown
-		;;
-	c54x)
-		basic_machine=tic54x-unknown
-		;;
-	c55x)
-		basic_machine=tic55x-unknown
-		;;
-	c6x)
-		basic_machine=tic6x-unknown
-		;;
-	m6811 | m68hc11 | m6812 | m68hc12 | picochip)
-		# Motorola 68HC11/12.
-		basic_machine=$basic_machine-unknown
-		os=-none
-		;;
-	m88110 | m680[12346]0 | m683?2 | m68360 | m5200 | v70 | w65 | z8k)
-		;;
-	ms1)
-		basic_machine=mt-unknown
-		;;
-
-	strongarm | thumb | xscale)
-		basic_machine=arm-unknown
-		;;
-
-	xscaleeb)
-		basic_machine=armeb-unknown
-		;;
-
-	xscaleel)
-		basic_machine=armel-unknown
-		;;
-
-	# We use `pc' rather than `unknown'
-	# because (1) that's what they normally are, and
-	# (2) the word "unknown" tends to confuse beginning users.
-	i*86 | x86_64)
-	  basic_machine=$basic_machine-pc
-	  ;;
-	# Object if more than one company name word.
-	*-*-*)
-		echo Invalid configuration \`$1\': machine \`$basic_machine\' not recognized 1>&2
-		exit 1
-		;;
-	# Recognize the basic CPU types with company name.
-	580-* \
-	| a29k-* \
-	| alpha-* | alphaev[4-8]-* | alphaev56-* | alphaev6[78]-* \
-	| alpha64-* | alpha64ev[4-8]-* | alpha64ev56-* | alpha64ev6[78]-* \
-	| alphapca5[67]-* | alpha64pca5[67]-* | arc-* \
-	| arm-*  | armbe-* | armle-* | armeb-* | armv*-* \
-	| avr-* | avr32-* \
-	| be32-* | be64-* \
-	| bfin-* | bs2000-* \
-	| c[123]* | c30-* | [cjt]90-* | c4x-* \
-	| clipper-* | craynv-* | cydra-* \
-	| d10v-* | d30v-* | dlx-* \
-	| elxsi-* \
-	| f30[01]-* | f700-* | fido-* | fr30-* | frv-* | fx80-* \
-	| h8300-* | h8500-* \
-	| hppa-* | hppa1.[01]-* | hppa2.0-* | hppa2.0[nw]-* | hppa64-* \
-	| hexagon-* \
-	| i*86-* | i860-* | i960-* | ia64-* \
-	| ip2k-* | iq2000-* \
-	| le32-* | le64-* \
-	| lm32-* \
-	| m32c-* | m32r-* | m32rle-* \
-	| m68000-* | m680[012346]0-* | m68360-* | m683?2-* | m68k-* \
-	| m88110-* | m88k-* | maxq-* | mcore-* | metag-* | microblaze-* \
-	| mips-* | mipsbe-* | mipseb-* | mipsel-* | mipsle-* \
-	| mips16-* \
-	| mips64-* | mips64el-* \
-	| mips64octeon-* | mips64octeonel-* \
-	| mips64orion-* | mips64orionel-* \
-	| mips64r5900-* | mips64r5900el-* \
-	| mips64vr-* | mips64vrel-* \
-	| mips64vr4100-* | mips64vr4100el-* \
-	| mips64vr4300-* | mips64vr4300el-* \
-	| mips64vr5000-* | mips64vr5000el-* \
-	| mips64vr5900-* | mips64vr5900el-* \
-	| mipsisa32-* | mipsisa32el-* \
-	| mipsisa32r2-* | mipsisa32r2el-* \
-	| mipsisa64-* | mipsisa64el-* \
-	| mipsisa64r2-* | mipsisa64r2el-* \
-	| mipsisa64sb1-* | mipsisa64sb1el-* \
-	| mipsisa64sr71k-* | mipsisa64sr71kel-* \
-	| mipstx39-* | mipstx39el-* \
-	| mmix-* \
-	| mt-* \
-	| msp430-* \
-	| nds32-* | nds32le-* | nds32be-* \
-	| nios-* | nios2-* \
-	| none-* | np1-* | ns16k-* | ns32k-* \
-	| open8-* \
-	| orion-* \
-	| pdp10-* | pdp11-* | pj-* | pjl-* | pn-* | power-* \
-	| powerpc-* | powerpc64-* | powerpc64le-* | powerpcle-* \
-	| pyramid-* \
-	| rl78-* | romp-* | rs6000-* | rx-* \
-	| sh-* | sh[1234]-* | sh[24]a-* | sh[24]aeb-* | sh[23]e-* | sh[34]eb-* | sheb-* | shbe-* \
-	| shle-* | sh[1234]le-* | sh3ele-* | sh64-* | sh64le-* \
-	| sparc-* | sparc64-* | sparc64b-* | sparc64v-* | sparc86x-* | sparclet-* \
-	| sparclite-* \
-	| sparcv8-* | sparcv9-* | sparcv9b-* | sparcv9v-* | sv1-* | sx?-* \
-	| tahoe-* \
-	| tic30-* | tic4x-* | tic54x-* | tic55x-* | tic6x-* | tic80-* \
-	| tile*-* \
-	| tron-* \
-	| ubicom32-* \
-	| v850-* | v850e-* | v850e1-* | v850es-* | v850e2-* | v850e2v3-* \
-	| vax-* \
-	| we32k-* \
-	| x86-* | x86_64-* | xc16x-* | xps100-* \
-	| xstormy16-* | xtensa*-* \
-	| ymp-* \
-	| z8k-* | z80-*)
-		;;
-	# Recognize the basic CPU types without company name, with glob match.
-	xtensa*)
-		basic_machine=$basic_machine-unknown
-		;;
-	# Recognize the various machine names and aliases which stand
-	# for a CPU type and a company and sometimes even an OS.
-	386bsd)
-		basic_machine=i386-unknown
-		os=-bsd
-		;;
-	3b1 | 7300 | 7300-att | att-7300 | pc7300 | safari | unixpc)
-		basic_machine=m68000-att
-		;;
-	3b*)
-		basic_machine=we32k-att
-		;;
-	a29khif)
-		basic_machine=a29k-amd
-		os=-udi
-		;;
-	abacus)
-		basic_machine=abacus-unknown
-		;;
-	adobe68k)
-		basic_machine=m68010-adobe
-		os=-scout
-		;;
-	alliant | fx80)
-		basic_machine=fx80-alliant
-		;;
-	altos | altos3068)
-		basic_machine=m68k-altos
-		;;
-	am29k)
-		basic_machine=a29k-none
-		os=-bsd
-		;;
-	amd64)
-		basic_machine=x86_64-pc
-		;;
-	amd64-*)
-		basic_machine=x86_64-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	amdahl)
-		basic_machine=580-amdahl
-		os=-sysv
-		;;
-	amiga | amiga-*)
-		basic_machine=m68k-unknown
-		;;
-	amigaos | amigados)
-		basic_machine=m68k-unknown
-		os=-amigaos
-		;;
-	amigaunix | amix)
-		basic_machine=m68k-unknown
-		os=-sysv4
-		;;
-	apollo68)
-		basic_machine=m68k-apollo
-		os=-sysv
-		;;
-	apollo68bsd)
-		basic_machine=m68k-apollo
-		os=-bsd
-		;;
-	aros)
-		basic_machine=i386-pc
-		os=-aros
-		;;
-	aux)
-		basic_machine=m68k-apple
-		os=-aux
-		;;
-	balance)
-		basic_machine=ns32k-sequent
-		os=-dynix
-		;;
-	blackfin)
-		basic_machine=bfin-unknown
-		os=-linux
-		;;
-	blackfin-*)
-		basic_machine=bfin-`echo $basic_machine | sed 's/^[^-]*-//'`
-		os=-linux
-		;;
-	bluegene*)
-		basic_machine=powerpc-ibm
-		os=-cnk
-		;;
-	c54x-*)
-		basic_machine=tic54x-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	c55x-*)
-		basic_machine=tic55x-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	c6x-*)
-		basic_machine=tic6x-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	c90)
-		basic_machine=c90-cray
-		os=-unicos
-		;;
-	cegcc)
-		basic_machine=arm-unknown
-		os=-cegcc
-		;;
-	convex-c1)
-		basic_machine=c1-convex
-		os=-bsd
-		;;
-	convex-c2)
-		basic_machine=c2-convex
-		os=-bsd
-		;;
-	convex-c32)
-		basic_machine=c32-convex
-		os=-bsd
-		;;
-	convex-c34)
-		basic_machine=c34-convex
-		os=-bsd
-		;;
-	convex-c38)
-		basic_machine=c38-convex
-		os=-bsd
-		;;
-	cray | j90)
-		basic_machine=j90-cray
-		os=-unicos
-		;;
-	craynv)
-		basic_machine=craynv-cray
-		os=-unicosmp
-		;;
-	cr16 | cr16-*)
-		basic_machine=cr16-unknown
-		os=-elf
-		;;
-	crds | unos)
-		basic_machine=m68k-crds
-		;;
-	crisv32 | crisv32-* | etraxfs*)
-		basic_machine=crisv32-axis
-		;;
-	cris | cris-* | etrax*)
-		basic_machine=cris-axis
-		;;
-	crx)
-		basic_machine=crx-unknown
-		os=-elf
-		;;
-	da30 | da30-*)
-		basic_machine=m68k-da30
-		;;
-	decstation | decstation-3100 | pmax | pmax-* | pmin | dec3100 | decstatn)
-		basic_machine=mips-dec
-		;;
-	decsystem10* | dec10*)
-		basic_machine=pdp10-dec
-		os=-tops10
-		;;
-	decsystem20* | dec20*)
-		basic_machine=pdp10-dec
-		os=-tops20
-		;;
-	delta | 3300 | motorola-3300 | motorola-delta \
-	      | 3300-motorola | delta-motorola)
-		basic_machine=m68k-motorola
-		;;
-	delta88)
-		basic_machine=m88k-motorola
-		os=-sysv3
-		;;
-	dicos)
-		basic_machine=i686-pc
-		os=-dicos
-		;;
-	djgpp)
-		basic_machine=i586-pc
-		os=-msdosdjgpp
-		;;
-	dpx20 | dpx20-*)
-		basic_machine=rs6000-bull
-		os=-bosx
-		;;
-	dpx2* | dpx2*-bull)
-		basic_machine=m68k-bull
-		os=-sysv3
-		;;
-	ebmon29k)
-		basic_machine=a29k-amd
-		os=-ebmon
-		;;
-	elxsi)
-		basic_machine=elxsi-elxsi
-		os=-bsd
-		;;
-	encore | umax | mmax)
-		basic_machine=ns32k-encore
-		;;
-	es1800 | OSE68k | ose68k | ose | OSE)
-		basic_machine=m68k-ericsson
-		os=-ose
-		;;
-	fx2800)
-		basic_machine=i860-alliant
-		;;
-	genix)
-		basic_machine=ns32k-ns
-		;;
-	gmicro)
-		basic_machine=tron-gmicro
-		os=-sysv
-		;;
-	go32)
-		basic_machine=i386-pc
-		os=-go32
-		;;
-	h3050r* | hiux*)
-		basic_machine=hppa1.1-hitachi
-		os=-hiuxwe2
-		;;
-	h8300hms)
-		basic_machine=h8300-hitachi
-		os=-hms
-		;;
-	h8300xray)
-		basic_machine=h8300-hitachi
-		os=-xray
-		;;
-	h8500hms)
-		basic_machine=h8500-hitachi
-		os=-hms
-		;;
-	harris)
-		basic_machine=m88k-harris
-		os=-sysv3
-		;;
-	hp300-*)
-		basic_machine=m68k-hp
-		;;
-	hp300bsd)
-		basic_machine=m68k-hp
-		os=-bsd
-		;;
-	hp300hpux)
-		basic_machine=m68k-hp
-		os=-hpux
-		;;
-	hp3k9[0-9][0-9] | hp9[0-9][0-9])
-		basic_machine=hppa1.0-hp
-		;;
-	hp9k2[0-9][0-9] | hp9k31[0-9])
-		basic_machine=m68000-hp
-		;;
-	hp9k3[2-9][0-9])
-		basic_machine=m68k-hp
-		;;
-	hp9k6[0-9][0-9] | hp6[0-9][0-9])
-		basic_machine=hppa1.0-hp
-		;;
-	hp9k7[0-79][0-9] | hp7[0-79][0-9])
-		basic_machine=hppa1.1-hp
-		;;
-	hp9k78[0-9] | hp78[0-9])
-		# FIXME: really hppa2.0-hp
-		basic_machine=hppa1.1-hp
-		;;
-	hp9k8[67]1 | hp8[67]1 | hp9k80[24] | hp80[24] | hp9k8[78]9 | hp8[78]9 | hp9k893 | hp893)
-		# FIXME: really hppa2.0-hp
-		basic_machine=hppa1.1-hp
-		;;
-	hp9k8[0-9][13679] | hp8[0-9][13679])
-		basic_machine=hppa1.1-hp
-		;;
-	hp9k8[0-9][0-9] | hp8[0-9][0-9])
-		basic_machine=hppa1.0-hp
-		;;
-	hppa-next)
-		os=-nextstep3
-		;;
-	hppaosf)
-		basic_machine=hppa1.1-hp
-		os=-osf
-		;;
-	hppro)
-		basic_machine=hppa1.1-hp
-		os=-proelf
-		;;
-	i370-ibm* | ibm*)
-		basic_machine=i370-ibm
-		;;
-# I'm not sure what "Sysv32" means.  Should this be sysv3.2?
-	i*86v32)
-		basic_machine=`echo $1 | sed -e 's/86.*/86-pc/'`
-		os=-sysv32
-		;;
-	i*86v4*)
-		basic_machine=`echo $1 | sed -e 's/86.*/86-pc/'`
-		os=-sysv4
-		;;
-	i*86v)
-		basic_machine=`echo $1 | sed -e 's/86.*/86-pc/'`
-		os=-sysv
-		;;
-	i*86sol2)
-		basic_machine=`echo $1 | sed -e 's/86.*/86-pc/'`
-		os=-solaris2
-		;;
-	i386mach)
-		basic_machine=i386-mach
-		os=-mach
-		;;
-	i386-vsta | vsta)
-		basic_machine=i386-unknown
-		os=-vsta
-		;;
-	iris | iris4d)
-		basic_machine=mips-sgi
-		case $os in
-		    -irix*)
-			;;
-		    *)
-			os=-irix4
-			;;
-		esac
-		;;
-	isi68 | isi)
-		basic_machine=m68k-isi
-		os=-sysv
-		;;
-	m68knommu)
-		basic_machine=m68k-unknown
-		os=-linux
-		;;
-	m68knommu-*)
-		basic_machine=m68k-`echo $basic_machine | sed 's/^[^-]*-//'`
-		os=-linux
-		;;
-	m88k-omron*)
-		basic_machine=m88k-omron
-		;;
-	magnum | m3230)
-		basic_machine=mips-mips
-		os=-sysv
-		;;
-	merlin)
-		basic_machine=ns32k-utek
-		os=-sysv
-		;;
-	microblaze)
-		basic_machine=microblaze-xilinx
-		;;
-	mingw32)
-		basic_machine=i386-pc
-		os=-mingw32
-		;;
-	mingw32ce)
-		basic_machine=arm-unknown
-		os=-mingw32ce
-		;;
-	miniframe)
-		basic_machine=m68000-convergent
-		;;
-	*mint | -mint[0-9]* | *MiNT | *MiNT[0-9]*)
-		basic_machine=m68k-atari
-		os=-mint
-		;;
-	mips3*-*)
-		basic_machine=`echo $basic_machine | sed -e 's/mips3/mips64/'`
-		;;
-	mips3*)
-		basic_machine=`echo $basic_machine | sed -e 's/mips3/mips64/'`-unknown
-		;;
-	monitor)
-		basic_machine=m68k-rom68k
-		os=-coff
-		;;
-	morphos)
-		basic_machine=powerpc-unknown
-		os=-morphos
-		;;
-	msdos)
-		basic_machine=i386-pc
-		os=-msdos
-		;;
-	ms1-*)
-		basic_machine=`echo $basic_machine | sed -e 's/ms1-/mt-/'`
-		;;
-	msys)
-		basic_machine=i386-pc
-		os=-msys
-		;;
-	mvs)
-		basic_machine=i370-ibm
-		os=-mvs
-		;;
-	nacl)
-		basic_machine=le32-unknown
-		os=-nacl
-		;;
-	ncr3000)
-		basic_machine=i486-ncr
-		os=-sysv4
-		;;
-	netbsd386)
-		basic_machine=i386-unknown
-		os=-netbsd
-		;;
-	netwinder)
-		basic_machine=armv4l-rebel
-		os=-linux
-		;;
-	news | news700 | news800 | news900)
-		basic_machine=m68k-sony
-		os=-newsos
-		;;
-	news1000)
-		basic_machine=m68030-sony
-		os=-newsos
-		;;
-	news-3600 | risc-news)
-		basic_machine=mips-sony
-		os=-newsos
-		;;
-	necv70)
-		basic_machine=v70-nec
-		os=-sysv
-		;;
-	next | m*-next )
-		basic_machine=m68k-next
-		case $os in
-		    -nextstep* )
-			;;
-		    -ns2*)
-		      os=-nextstep2
-			;;
-		    *)
-		      os=-nextstep3
-			;;
-		esac
-		;;
-	nh3000)
-		basic_machine=m68k-harris
-		os=-cxux
-		;;
-	nh[45]000)
-		basic_machine=m88k-harris
-		os=-cxux
-		;;
-	nindy960)
-		basic_machine=i960-intel
-		os=-nindy
-		;;
-	mon960)
-		basic_machine=i960-intel
-		os=-mon960
-		;;
-	nonstopux)
-		basic_machine=mips-compaq
-		os=-nonstopux
-		;;
-	np1)
-		basic_machine=np1-gould
-		;;
-	neo-tandem)
-		basic_machine=neo-tandem
-		;;
-	nse-tandem)
-		basic_machine=nse-tandem
-		;;
-	nsr-tandem)
-		basic_machine=nsr-tandem
-		;;
-	op50n-* | op60c-*)
-		basic_machine=hppa1.1-oki
-		os=-proelf
-		;;
-	openrisc | openrisc-*)
-		basic_machine=or32-unknown
-		;;
-	os400)
-		basic_machine=powerpc-ibm
-		os=-os400
-		;;
-	OSE68000 | ose68000)
-		basic_machine=m68000-ericsson
-		os=-ose
-		;;
-	os68k)
-		basic_machine=m68k-none
-		os=-os68k
-		;;
-	pa-hitachi)
-		basic_machine=hppa1.1-hitachi
-		os=-hiuxwe2
-		;;
-	paragon)
-		basic_machine=i860-intel
-		os=-osf
-		;;
-	parisc)
-		basic_machine=hppa-unknown
-		os=-linux
-		;;
-	parisc-*)
-		basic_machine=hppa-`echo $basic_machine | sed 's/^[^-]*-//'`
-		os=-linux
-		;;
-	pbd)
-		basic_machine=sparc-tti
-		;;
-	pbb)
-		basic_machine=m68k-tti
-		;;
-	pc532 | pc532-*)
-		basic_machine=ns32k-pc532
-		;;
-	pc98)
-		basic_machine=i386-pc
-		;;
-	pc98-*)
-		basic_machine=i386-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	pentium | p5 | k5 | k6 | nexgen | viac3)
-		basic_machine=i586-pc
-		;;
-	pentiumpro | p6 | 6x86 | athlon | athlon_*)
-		basic_machine=i686-pc
-		;;
-	pentiumii | pentium2 | pentiumiii | pentium3)
-		basic_machine=i686-pc
-		;;
-	pentium4)
-		basic_machine=i786-pc
-		;;
-	pentium-* | p5-* | k5-* | k6-* | nexgen-* | viac3-*)
-		basic_machine=i586-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	pentiumpro-* | p6-* | 6x86-* | athlon-*)
-		basic_machine=i686-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	pentiumii-* | pentium2-* | pentiumiii-* | pentium3-*)
-		basic_machine=i686-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	pentium4-*)
-		basic_machine=i786-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	pn)
-		basic_machine=pn-gould
-		;;
-	power)	basic_machine=power-ibm
-		;;
-	ppc | ppcbe)	basic_machine=powerpc-unknown
-		;;
-	ppc-* | ppcbe-*)
-		basic_machine=powerpc-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	ppcle | powerpclittle | ppc-le | powerpc-little)
-		basic_machine=powerpcle-unknown
-		;;
-	ppcle-* | powerpclittle-*)
-		basic_machine=powerpcle-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	ppc64)	basic_machine=powerpc64-unknown
-		;;
-	ppc64-*) basic_machine=powerpc64-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	ppc64le | powerpc64little | ppc64-le | powerpc64-little)
-		basic_machine=powerpc64le-unknown
-		;;
-	ppc64le-* | powerpc64little-*)
-		basic_machine=powerpc64le-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	ps2)
-		basic_machine=i386-ibm
-		;;
-	pw32)
-		basic_machine=i586-unknown
-		os=-pw32
-		;;
-	rdos)
-		basic_machine=i386-pc
-		os=-rdos
-		;;
-	rom68k)
-		basic_machine=m68k-rom68k
-		os=-coff
-		;;
-	rm[46]00)
-		basic_machine=mips-siemens
-		;;
-	rtpc | rtpc-*)
-		basic_machine=romp-ibm
-		;;
-	s390 | s390-*)
-		basic_machine=s390-ibm
-		;;
-	s390x | s390x-*)
-		basic_machine=s390x-ibm
-		;;
-	sa29200)
-		basic_machine=a29k-amd
-		os=-udi
-		;;
-	sb1)
-		basic_machine=mipsisa64sb1-unknown
-		;;
-	sb1el)
-		basic_machine=mipsisa64sb1el-unknown
-		;;
-	sde)
-		basic_machine=mipsisa32-sde
-		os=-elf
-		;;
-	sei)
-		basic_machine=mips-sei
-		os=-seiux
-		;;
-	sequent)
-		basic_machine=i386-sequent
-		;;
-	sh)
-		basic_machine=sh-hitachi
-		os=-hms
-		;;
-	sh5el)
-		basic_machine=sh5le-unknown
-		;;
-	sh64)
-		basic_machine=sh64-unknown
-		;;
-	sparclite-wrs | simso-wrs)
-		basic_machine=sparclite-wrs
-		os=-vxworks
-		;;
-	sps7)
-		basic_machine=m68k-bull
-		os=-sysv2
-		;;
-	spur)
-		basic_machine=spur-unknown
-		;;
-	st2000)
-		basic_machine=m68k-tandem
-		;;
-	stratus)
-		basic_machine=i860-stratus
-		os=-sysv4
-		;;
-	strongarm-* | thumb-*)
-		basic_machine=arm-`echo $basic_machine | sed 's/^[^-]*-//'`
-		;;
-	sun2)
-		basic_machine=m68000-sun
-		;;
-	sun2os3)
-		basic_machine=m68000-sun
-		os=-sunos3
-		;;
-	sun2os4)
-		basic_machine=m68000-sun
-		os=-sunos4
-		;;
-	sun3os3)
-		basic_machine=m68k-sun
-		os=-sunos3
-		;;
-	sun3os4)
-		basic_machine=m68k-sun
-		os=-sunos4
-		;;
-	sun4os3)
-		basic_machine=sparc-sun
-		os=-sunos3
-		;;
-	sun4os4)
-		basic_machine=sparc-sun
-		os=-sunos4
-		;;
-	sun4sol2)
-		basic_machine=sparc-sun
-		os=-solaris2
-		;;
-	sun3 | sun3-*)
-		basic_machine=m68k-sun
-		;;
-	sun4)
-		basic_machine=sparc-sun
-		;;
-	sun386 | sun386i | roadrunner)
-		basic_machine=i386-sun
-		;;
-	sv1)
-		basic_machine=sv1-cray
-		os=-unicos
-		;;
-	symmetry)
-		basic_machine=i386-sequent
-		os=-dynix
-		;;
-	t3e)
-		basic_machine=alphaev5-cray
-		os=-unicos
-		;;
-	t90)
-		basic_machine=t90-cray
-		os=-unicos
-		;;
-	tile*)
-		basic_machine=$basic_machine-unknown
-		os=-linux-gnu
-		;;
-	tx39)
-		basic_machine=mipstx39-unknown
-		;;
-	tx39el)
-		basic_machine=mipstx39el-unknown
-		;;
-	toad1)
-		basic_machine=pdp10-xkl
-		os=-tops20
-		;;
-	tower | tower-32)
-		basic_machine=m68k-ncr
-		;;
-	tpf)
-		basic_machine=s390x-ibm
-		os=-tpf
-		;;
-	udi29k)
-		basic_machine=a29k-amd
-		os=-udi
-		;;
-	ultra3)
-		basic_machine=a29k-nyu
-		os=-sym1
-		;;
-	v810 | necv810)
-		basic_machine=v810-nec
-		os=-none
-		;;
-	vaxv)
-		basic_machine=vax-dec
-		os=-sysv
-		;;
-	vms)
-		basic_machine=vax-dec
-		os=-vms
-		;;
-	vpp*|vx|vx-*)
-		basic_machine=f301-fujitsu
-		;;
-	vxworks960)
-		basic_machine=i960-wrs
-		os=-vxworks
-		;;
-	vxworks68)
-		basic_machine=m68k-wrs
-		os=-vxworks
-		;;
-	vxworks29k)
-		basic_machine=a29k-wrs
-		os=-vxworks
-		;;
-	w65*)
-		basic_machine=w65-wdc
-		os=-none
-		;;
-	w89k-*)
-		basic_machine=hppa1.1-winbond
-		os=-proelf
-		;;
-	xbox)
-		basic_machine=i686-pc
-		os=-mingw32
-		;;
-	xps | xps100)
-		basic_machine=xps100-honeywell
-		;;
-	xscale-* | xscalee[bl]-*)
-		basic_machine=`echo $basic_machine | sed 's/^xscale/arm/'`
-		;;
-	ymp)
-		basic_machine=ymp-cray
-		os=-unicos
-		;;
-	z8k-*-coff)
-		basic_machine=z8k-unknown
-		os=-sim
-		;;
-	z80-*-coff)
-		basic_machine=z80-unknown
-		os=-sim
-		;;
-	none)
-		basic_machine=none-none
-		os=-none
-		;;
-
-# Here we handle the default manufacturer of certain CPU types.  It is in
-# some cases the only manufacturer, in others, it is the most popular.
-	w89k)
-		basic_machine=hppa1.1-winbond
-		;;
-	op50n)
-		basic_machine=hppa1.1-oki
-		;;
-	op60c)
-		basic_machine=hppa1.1-oki
-		;;
-	romp)
-		basic_machine=romp-ibm
-		;;
-	mmix)
-		basic_machine=mmix-knuth
-		;;
-	rs6000)
-		basic_machine=rs6000-ibm
-		;;
-	vax)
-		basic_machine=vax-dec
-		;;
-	pdp10)
-		# there are many clones, so DEC is not a safe bet
-		basic_machine=pdp10-unknown
-		;;
-	pdp11)
-		basic_machine=pdp11-dec
-		;;
-	we32k)
-		basic_machine=we32k-att
-		;;
-	sh[1234] | sh[24]a | sh[24]aeb | sh[34]eb | sh[1234]le | sh[23]ele)
-		basic_machine=sh-unknown
-		;;
-	sparc | sparcv8 | sparcv9 | sparcv9b | sparcv9v)
-		basic_machine=sparc-sun
-		;;
-	cydra)
-		basic_machine=cydra-cydrome
-		;;
-	orion)
-		basic_machine=orion-highlevel
-		;;
-	orion105)
-		basic_machine=clipper-highlevel
-		;;
-	mac | mpw | mac-mpw)
-		basic_machine=m68k-apple
-		;;
-	pmac | pmac-mpw)
-		basic_machine=powerpc-apple
-		;;
-	*-unknown)
-		# Make sure to match an already-canonicalized machine name.
-		;;
-	*)
-		echo Invalid configuration \`$1\': machine \`$basic_machine\' not recognized 1>&2
-		exit 1
-		;;
-esac
-
-# Here we canonicalize certain aliases for manufacturers.
-case $basic_machine in
-	*-digital*)
-		basic_machine=`echo $basic_machine | sed 's/digital.*/dec/'`
-		;;
-	*-commodore*)
-		basic_machine=`echo $basic_machine | sed 's/commodore.*/cbm/'`
-		;;
-	*)
-		;;
-esac
-
-# Decode manufacturer-specific aliases for certain operating systems.
-
-if [ x"$os" != x"" ]
-then
-case $os in
-	# First match some system type aliases
-	# that might get confused with valid system types.
-	# -solaris* is a basic system type, with this one exception.
-	-auroraux)
-		os=-auroraux
-		;;
-	-solaris1 | -solaris1.*)
-		os=`echo $os | sed -e 's|solaris1|sunos4|'`
-		;;
-	-solaris)
-		os=-solaris2
-		;;
-	-svr4*)
-		os=-sysv4
-		;;
-	-unixware*)
-		os=-sysv4.2uw
-		;;
-	-gnu/linux*)
-		os=`echo $os | sed -e 's|gnu/linux|linux-gnu|'`
-		;;
-	# First accept the basic system types.
-	# The portable systems comes first.
-	# Each alternative MUST END IN A *, to match a version number.
-	# -sysv* is not here because it comes later, after sysvr4.
-	-gnu* | -bsd* | -mach* | -minix* | -genix* | -ultrix* | -irix* \
-	      | -*vms* | -sco* | -esix* | -isc* | -aix* | -cnk* | -sunos | -sunos[34]*\
-	      | -hpux* | -unos* | -osf* | -luna* | -dgux* | -auroraux* | -solaris* \
-	      | -sym* | -kopensolaris* \
-	      | -amigaos* | -amigados* | -msdos* | -newsos* | -unicos* | -aof* \
-	      | -aos* | -aros* \
-	      | -nindy* | -vxsim* | -vxworks* | -ebmon* | -hms* | -mvs* \
-	      | -clix* | -riscos* | -uniplus* | -iris* | -rtu* | -xenix* \
-	      | -hiux* | -386bsd* | -knetbsd* | -mirbsd* | -netbsd* \
-	      | -openbsd* | -solidbsd* \
-	      | -ekkobsd* | -kfreebsd* | -freebsd* | -riscix* | -lynxos* \
-	      | -bosx* | -nextstep* | -cxux* | -aout* | -elf* | -oabi* \
-	      | -ptx* | -coff* | -ecoff* | -winnt* | -domain* | -vsta* \
-	      | -udi* | -eabi* | -lites* | -ieee* | -go32* | -aux* \
-	      | -chorusos* | -chorusrdb* | -cegcc* \
-	      | -cygwin* | -msys* | -pe* | -psos* | -moss* | -proelf* | -rtems* \
-	      | -mingw32* | -linux-gnu* | -linux-android* \
-	      | -linux-newlib* | -linux-uclibc* \
-	      | -uxpv* | -beos* | -mpeix* | -udk* \
-	      | -interix* | -uwin* | -mks* | -rhapsody* | -darwin* | -opened* \
-	      | -openstep* | -oskit* | -conix* | -pw32* | -nonstopux* \
-	      | -storm-chaos* | -tops10* | -tenex* | -tops20* | -its* \
-	      | -os2* | -vos* | -palmos* | -uclinux* | -nucleus* \
-	      | -morphos* | -superux* | -rtmk* | -rtmk-nova* | -windiss* \
-	      | -powermax* | -dnix* | -nx6 | -nx7 | -sei* | -dragonfly* \
-	      | -skyos* | -haiku* | -rdos* | -toppers* | -drops* | -es*)
-	# Remember, each alternative MUST END IN *, to match a version number.
-		;;
-	-qnx*)
-		case $basic_machine in
-		    x86-* | i*86-*)
-			;;
-		    *)
-			os=-nto$os
-			;;
-		esac
-		;;
-	-nto-qnx*)
-		;;
-	-nto*)
-		os=`echo $os | sed -e 's|nto|nto-qnx|'`
-		;;
-	-sim | -es1800* | -hms* | -xray | -os68k* | -none* | -v88r* \
-	      | -windows* | -osx | -abug | -netware* | -os9* | -beos* | -haiku* \
-	      | -macos* | -mpw* | -magic* | -mmixware* | -mon960* | -lnews*)
-		;;
-	-mac*)
-		os=`echo $os | sed -e 's|mac|macos|'`
-		;;
-	-linux-dietlibc)
-		os=-linux-dietlibc
-		;;
-	-linux*)
-		os=`echo $os | sed -e 's|linux|linux-gnu|'`
-		;;
-	-sunos5*)
-		os=`echo $os | sed -e 's|sunos5|solaris2|'`
-		;;
-	-sunos6*)
-		os=`echo $os | sed -e 's|sunos6|solaris3|'`
-		;;
-	-opened*)
-		os=-openedition
-		;;
-	-os400*)
-		os=-os400
-		;;
-	-wince*)
-		os=-wince
-		;;
-	-osfrose*)
-		os=-osfrose
-		;;
-	-osf*)
-		os=-osf
-		;;
-	-utek*)
-		os=-bsd
-		;;
-	-dynix*)
-		os=-bsd
-		;;
-	-acis*)
-		os=-aos
-		;;
-	-atheos*)
-		os=-atheos
-		;;
-	-syllable*)
-		os=-syllable
-		;;
-	-386bsd)
-		os=-bsd
-		;;
-	-ctix* | -uts*)
-		os=-sysv
-		;;
-	-nova*)
-		os=-rtmk-nova
-		;;
-	-ns2 )
-		os=-nextstep2
-		;;
-	-nsk*)
-		os=-nsk
-		;;
-	# Preserve the version number of sinix5.
-	-sinix5.*)
-		os=`echo $os | sed -e 's|sinix|sysv|'`
-		;;
-	-sinix*)
-		os=-sysv4
-		;;
-	-tpf*)
-		os=-tpf
-		;;
-	-triton*)
-		os=-sysv3
-		;;
-	-oss*)
-		os=-sysv3
-		;;
-	-svr4)
-		os=-sysv4
-		;;
-	-svr3)
-		os=-sysv3
-		;;
-	-sysvr4)
-		os=-sysv4
-		;;
-	# This must come after -sysvr4.
-	-sysv*)
-		;;
-	-ose*)
-		os=-ose
-		;;
-	-es1800*)
-		os=-ose
-		;;
-	-xenix)
-		os=-xenix
-		;;
-	-*mint | -mint[0-9]* | -*MiNT | -MiNT[0-9]*)
-		os=-mint
-		;;
-	-aros*)
-		os=-aros
-		;;
-	-kaos*)
-		os=-kaos
-		;;
-	-zvmoe)
-		os=-zvmoe
-		;;
-	-dicos*)
-		os=-dicos
-		;;
-	-nacl*)
-		;;
-	-none)
-		;;
-	*)
-		# Get rid of the `-' at the beginning of $os.
-		os=`echo $os | sed 's/[^-]*-//'`
-		echo Invalid configuration \`$1\': system \`$os\' not recognized 1>&2
-		exit 1
-		;;
-esac
-else
-
-# Here we handle the default operating systems that come with various machines.
-# The value should be what the vendor currently ships out the door with their
-# machine or put another way, the most popular os provided with the machine.
-
-# Note that if you're going to try to match "-MANUFACTURER" here (say,
-# "-sun"), then you have to tell the case statement up towards the top
-# that MANUFACTURER isn't an operating system.  Otherwise, code above
-# will signal an error saying that MANUFACTURER isn't an operating
-# system, and we'll never get to this point.
-
-case $basic_machine in
-	score-*)
-		os=-elf
-		;;
-	spu-*)
-		os=-elf
-		;;
-	*-acorn)
-		os=-riscix1.2
-		;;
-	arm*-rebel)
-		os=-linux
-		;;
-	arm*-semi)
-		os=-aout
-		;;
-	c4x-* | tic4x-*)
-		os=-coff
-		;;
-	tic54x-*)
-		os=-coff
-		;;
-	tic55x-*)
-		os=-coff
-		;;
-	tic6x-*)
-		os=-coff
-		;;
-	# This must come before the *-dec entry.
-	pdp10-*)
-		os=-tops20
-		;;
-	pdp11-*)
-		os=-none
-		;;
-	*-dec | vax-*)
-		os=-ultrix4.2
-		;;
-	m68*-apollo)
-		os=-domain
-		;;
-	i386-sun)
-		os=-sunos4.0.2
-		;;
-	m68000-sun)
-		os=-sunos3
-		# This also exists in the configure program, but was not the
-		# default.
-		# os=-sunos4
-		;;
-	m68*-cisco)
-		os=-aout
-		;;
-	mep-*)
-		os=-elf
-		;;
-	mips*-cisco)
-		os=-elf
-		;;
-	mips*-*)
-		os=-elf
-		;;
-	or32-*)
-		os=-coff
-		;;
-	*-tti)	# must be before sparc entry or we get the wrong os.
-		os=-sysv3
-		;;
-	sparc-* | *-sun)
-		os=-sunos4.1.1
-		;;
-	*-be)
-		os=-beos
-		;;
-	*-haiku)
-		os=-haiku
-		;;
-	*-ibm)
-		os=-aix
-		;;
-	*-knuth)
-		os=-mmixware
-		;;
-	*-wec)
-		os=-proelf
-		;;
-	*-winbond)
-		os=-proelf
-		;;
-	*-oki)
-		os=-proelf
-		;;
-	*-hp)
-		os=-hpux
-		;;
-	*-hitachi)
-		os=-hiux
-		;;
-	i860-* | *-att | *-ncr | *-altos | *-motorola | *-convergent)
-		os=-sysv
-		;;
-	*-cbm)
-		os=-amigaos
-		;;
-	*-dg)
-		os=-dgux
-		;;
-	*-dolphin)
-		os=-sysv3
-		;;
-	m68k-ccur)
-		os=-rtu
-		;;
-	m88k-omron*)
-		os=-luna
-		;;
-	*-next )
-		os=-nextstep
-		;;
-	*-sequent)
-		os=-ptx
-		;;
-	*-crds)
-		os=-unos
-		;;
-	*-ns)
-		os=-genix
-		;;
-	i370-*)
-		os=-mvs
-		;;
-	*-next)
-		os=-nextstep3
-		;;
-	*-gould)
-		os=-sysv
-		;;
-	*-highlevel)
-		os=-bsd
-		;;
-	*-encore)
-		os=-bsd
-		;;
-	*-sgi)
-		os=-irix
-		;;
-	*-siemens)
-		os=-sysv4
-		;;
-	*-masscomp)
-		os=-rtu
-		;;
-	f30[01]-fujitsu | f700-fujitsu)
-		os=-uxpv
-		;;
-	*-rom68k)
-		os=-coff
-		;;
-	*-*bug)
-		os=-coff
-		;;
-	*-apple)
-		os=-macos
-		;;
-	*-atari*)
-		os=-mint
-		;;
-	*)
-		os=-none
-		;;
-esac
-fi
-
-# Here we handle the case where we know the os, and the CPU type, but not the
-# manufacturer.  We pick the logical manufacturer.
-vendor=unknown
-case $basic_machine in
-	*-unknown)
-		case $os in
-			-riscix*)
-				vendor=acorn
-				;;
-			-sunos*)
-				vendor=sun
-				;;
-			-cnk*|-aix*)
-				vendor=ibm
-				;;
-			-beos*)
-				vendor=be
-				;;
-			-hpux*)
-				vendor=hp
-				;;
-			-mpeix*)
-				vendor=hp
-				;;
-			-hiux*)
-				vendor=hitachi
-				;;
-			-unos*)
-				vendor=crds
-				;;
-			-dgux*)
-				vendor=dg
-				;;
-			-luna*)
-				vendor=omron
-				;;
-			-genix*)
-				vendor=ns
-				;;
-			-mvs* | -opened*)
-				vendor=ibm
-				;;
-			-os400*)
-				vendor=ibm
-				;;
-			-ptx*)
-				vendor=sequent
-				;;
-			-tpf*)
-				vendor=ibm
-				;;
-			-vxsim* | -vxworks* | -windiss*)
-				vendor=wrs
-				;;
-			-aux*)
-				vendor=apple
-				;;
-			-hms*)
-				vendor=hitachi
-				;;
-			-mpw* | -macos*)
-				vendor=apple
-				;;
-			-*mint | -mint[0-9]* | -*MiNT | -MiNT[0-9]*)
-				vendor=atari
-				;;
-			-vos*)
-				vendor=stratus
-				;;
-		esac
-		basic_machine=`echo $basic_machine | sed "s/unknown/$vendor/"`
-		;;
-esac
-
-echo $basic_machine$os
-exit
-
-# Local variables:
-# eval: (add-hook 'write-file-hooks 'time-stamp)
-# time-stamp-start: "timestamp='"
-# time-stamp-format: "%:y-%02m-%02d"
-# time-stamp-end: "'"
-# End:
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/configure.ac b/sandbox/hurwitz.kroeker/src/float/cnf/configure.ac
deleted file mode 100644
index aeeded2..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/configure.ac
+++ /dev/null
@@ -1,601 +0,0 @@
-#############################################################################
-##
-#W  configure.ac                                            Laurent Bartholdi
-##                                                              Jakob Kroeker
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2009, Laurent Bartholdi
-##
-#############################################################################
-AC_PREREQ(2.67)
-LT_PREREQ([2.4.2])
-AC_INIT( [float], 4.0 ,laurent.bartholdi@gmail.com )
-AC_CONFIG_SRCDIR([src/mp_float.h])
-#AC_CONFIG_HEADER([src/pkgconfig.h:cnf/pkgconfig.h.in])
-AC_CONFIG_MACRO_DIR([m4])
-AC_CONFIG_AUX_DIR([cnf])
-AM_INIT_AUTOMAKE([foreign])
-AM_MAINTAINER_MODE
-LT_INIT([disable-static dlopen win32-dll])
-
-
-# Checks for programs.
-AC_PROG_CC
-AC_PROG_CXX
-
-############################################################################################################ 
-################## detect downloader wget(Linux) / curl(Mac OS)
-
-### todo: check if works as expected
-
-GETBIN=""
-GETBINPARAM=""
-
-AC_PATH_TOOL([GETBIN], [wget] )
-
-
-if test "$GETBIN" != ""; then
-GETBINPARAM=" -k --no-verbose --no-check-certificate "
-else
-    AC_PATH_TOOL([GETBIN], [curl] )
-    if test "$GETBIN" != ""; then
-       # see http://curl.haxx.se/docs/manpage.html for params! 
-       GETBINPARAM=" -L -C - -O " 
-    fi;
-fi;
-
-if test "$GETBIN" = ""; then
-   AC_ERROR([Could not locate 'wget' or 'curl'; please install! ] )
-fi;
-
-AC_SUBST(GETBIN)
-AC_SUBST(GETBINPARAM)
-###################################################### 
-
-
-AC_ARG_ENABLE(static,
- [  --enable-static  Enable static library build]
- )
- 
- AC_ARG_ENABLE(shared,
- [  --enable-shared  Disable shared library build]
- )
-
-CONFIGUREPARAMS=" "
-
-if test "$enable_static" = yes; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-static "
-   #else
-   #CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-static "
-fi;
-
-if test "$enable_shared" = no; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-shared "
-   else
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-shared "
-fi;
-
- 
-AC_SUBST(CONFIGUREPARAMS)
-
-GAC_stack_protector_flag="" 
-
-# Check for -fno-stack-protector, because we link within GAP
-AC_CACHE_CHECK([whether $CC accepts -fno-stack-protector],
-    [ns_cv_cc__nostackprotector],
-    [save_CFLAGS=$CFLAGS
-     CFLAGS="$CFLAGS -fno-stack-protector"
-     AC_LINK_IFELSE([AC_LANG_PROGRAM([], [])],
-                    [ns_cv_cc__nostackprotector=yes],
-                    [ns_cv_cc__nostackprotector=no])
-     CFLAGS=$save_CFLAGS])
-if test $ns_cv_cc__nostackprotector = yes; then
-     CFLAGS=" $CFLAGS -fno-stack-protector "
-     GAC_stack_protector_flag=" -p -fno-stack-protector "
-fi
-AC_SUBST(GAC_stack_protector_flag)
-
-
-AC_ARG_VAR([GAPDIR], [Location of the GAP root directory, e.g. ../..])
-
-if test -z "$GAPDIR"; then
-    for dir in ../.. /Applications/gap4r5; do
-        if test -f $dir/sysinfo.gap; then
-            GAPDIR=$dir
-            break
-        fi
-    done
-fi
-
-AC_ARG_VAR([CONFIGNAME],[Name of GAP build configuration])
-if test -n "$CONFIGNAME"; then
-    SYSINFO="$GAPDIR/sysinfo.gap-$CONFIGNAME"
-    MAKEFILE="Makefile-$CONFIGNAME"
-    GAPPROG="$GAPDIR/bin/gap-$CONFIGNAME.sh"
-else
-    SYSINFO="$GAPDIR/sysinfo.gap"
-    MAKEFILE="Makefile"
-    GAPPROG="$GAPDIR/bin/gap.sh"
-fi
-
-if ! test -f "$SYSINFO"; then
-    AC_ERROR([Could not locate the GAP root directory;
-        specify its location with './configure GAPDIR=DIR [CONFIGNAME=NAME)]'])
-fi
-
-GAPDIR=`cd "$GAPDIR" && pwd` # make path absolute
-AC_SUBST(GAPDIR)
-
-. "$SYSINFO"
-TARGET="$GAParch"
-
-echo checking target... "$TARGET"
-
-XTARGET="`cnf/config.guess`-$CC-`echo $TARGET | sed 's/.*-//'`"
-if test "$XTARGET" != "$GAParch_system"; then
-   AC_WARN([The guessed target $XTARGET is not the gap target $GAParch_system. Cross your fingers])
-fi
-AC_SUBST(TARGET)
-
-echo checking gap executable ... "$GAPPROG"
-
-if ! test -e "$GAPPROG"; then
-    AC_ERROR([Could not find GAP executable $GAPPROG])
-fi
-AC_SUBST(GAPPROG)
-
-GAC="$GAPDIR/bin/$TARGET/gac"
-
-echo checking gac compiler... $GAC
-
-if ! test -e "$GAC"; then
-    AC_ERROR([Could not find GAP compiler $GAC])
-fi
-AC_SUBST(GAC)
-
-################################################################
-# gmp configuration
-
-GMPDIR="$GAPDIR/bin/$TARGET/extern/gmp"
-GMPINCLUDE=""
-GMPLIB=""
-
-AC_ARG_WITH(gmp,
- [  --with-gmp=<location>|yes|no|gap
-    Location at which the GMP library, needed for MPFR, was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "gap", which is the default, asks MPFR
-    to use the version of gmp included in the GAP distribution.
- ],
- [if test "$withval" != gap; then GMPDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(gmp-include,
- [  --with-gmp-include=<location>
-    Location at which the GMP include files were installed.],
- [GMPINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(gmp-lib,
- [  --with-gmp-lib=<location>
-    Location at which the GMP library files were installed.],
- [GMPLIB="$withval"]
-)
-
-if test "$GMPDIR" != yes; then
-if test "$GMPINCLUDE" == ""; then GMPINCLUDE="$GMPDIR/include"; fi
-if test "$GMPLIB" == ""; then GMPLIB="$GMPDIR/lib"; fi
-fi
-
-################################################################
-# mpfr configuration
-
-EXTERN="\$(CURDIR)/bin/$TARGET/extern"
-
-MPFRDIR="$EXTERN"
-MPFRINCLUDE=""
-MPFRLIB=""
-
-AC_ARG_WITH(mpfr,
- [  --with-mpfr=<path>|yes|no|extern
-    Location at which the MPFR library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of mpfr in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then MPFRDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(mpfr-include,
- [  --with-mpfr-include=<location>
-    Location at which the MPFR include files were installed.],
- [MPFRINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(mpfr-lib,
- [  --with-mpfr-lib=<location>
-    Location at which the MPFR library files were installed.],
- [MPFRLIB="$withval"]
-)
-
-if test "$MPFRDIR" != yes; then
-if test "$MPFRINCLUDE" == ""; then MPFRINCLUDE="$MPFRDIR/include"; fi
-if test "$MPFRLIB" == ""; then MPFRLIB="$MPFRDIR/lib"; fi
-fi
-
-################################################################
-# mpfi configuration
-
-if test "MPFRDIR" != no; then
-
-MPFIDIR="$EXTERN"
-MPFIINCLUDE=""
-MPFILIB=""
-
-AC_ARG_WITH(mpfi,
- [  --with-mpfi=<path>|yes|no|extern
-    Location at which the MPFI library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of mpfi in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then MPFIDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(mpfi-include,
- [  --with-mpfi-include=<location>
-    Location at which the MPFI include files were installed.],
- [MPFIINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(mpfi-lib,
- [  --with-mpfi-lib=<location>
-    Location at which the MPFI library files were installed.],
- [MPFILIB="$withval"]
-)
-
-if test "$MPFIDIR" != yes; then
-if test "$MPFIINCLUDE" == ""; then MPFIINCLUDE="$MPFIDIR/include"; fi
-if test "$MPFILIB" == ""; then MPFILIB="$MPFIDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# mpc configuration
-
-if test "$MPFRDIR" != no; then
-
-MPCDIR="$EXTERN"
-MPCINCLUDE=""
-MPCLIB=""
-
-AC_ARG_WITH(mpc,
- [  --with-mpc=<path>|yes|no|extern
-    Location at which the MPC library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of mpc in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then MPCDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(mpc-include,
- [  --with-mpc-include=<location>
-    Location at which the MPC include files were installed.],
- [MPCINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(mpc-lib,
- [  --with-mpc-lib=<location>
-    Location at which the MPC library files were installed.],
- [MPCLIB="$withval"]
-)
-
-if test "$MPCDIR" != yes; then
-if test "$MPCINCLUDE" == ""; then MPCINCLUDE="$MPCDIR/include"; fi
-if test "$MPCLIB" == ""; then MPCLIB="$MPCDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# fplll configuration
-
-if test "$MPFRDIR" != no; then
-
-FPLLLDIR="$EXTERN"
-FPLLLINCLUDE=""
-FPLLLLIB=""
-
-AC_ARG_WITH(fplll,
- [  --with-fplll=<path>|yes|no|extern
-    Location at which the FPLLL library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of fplll in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then FPLLLDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(fplll-include,
- [  --with-fplll-include=<location>
-    Location at which the FPLLL include files were installed.],
- [FPLLLINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(fplll-lib,
- [  --with-fplll-lib=<location>
-    Location at which the FPLLL library files were installed.],
- [FPLLLLIB="$withval"]
-)
-
-if test "$FPLLLDIR" != yes; then
-if test "$FPLLLINCLUDE" == ""; then FPLLLINCLUDE="$FPLLLDIR/include"; fi
-if test "$FPLLLLIB" == ""; then FPLLLLIB="$FPLLLDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# cxsc configuration
-
-CXSCDIR="$EXTERN"
-CXSCINCLUDE=""
-CXSCLIB=""
-
-AC_ARG_WITH(cxsc,
- [  --with-cxsc=<path>|yes|no|extern
-    Location at which the CXSC library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of cxsc in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then CXSCDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(cxsc-include,
- [  --with-cxsc-include=<location>
-    Location at which the CXSC include files were installed.],
- [CXSCINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(cxsc-lib,
- [  --with-cxsc-lib=<location>
-    Location at which the CXSC library files were installed.],
- [CXSCLIB="$withval"]
-)
-
-if test "$CXSCDIR" != yes; then
-if test "$CXSCINCLUDE" == ""; then CXSCINCLUDE="$CXSCDIR/include"; fi
-if test "$CXSCLIB" == ""; then CXSCLIB="$CXSCDIR/lib"; fi
-fi
-
-################################################################
-# make target mpfr
-
-echo using GMP directory... $GMPDIR
-echo using MPFR directory... $MPFRDIR
-echo using MPFI directory... $MPFIDIR
-echo using MPC directory... $MPCDIR
-echo using FPLLL directory... $FPLLLDIR
-echo using CXSC directory... $CXSCDIR
-
-GACFLAGS=""
-DLL_TARGET="\$(LOCALBIN)"
-LIB_TARGET=""
-
-if test "$MPFRDIR" != no; then
-
-MP_FLOAT_LIB=""
-MP_FLOAT_O="\$(LOCALBIN)/mp_float.o"
-DLL_TARGET="$DLL_TARGET \$(LOCALBIN)/mp_float.so"
-
-# check gmp presence
-if test "$GMPINCLUDE" != ""; then
-   CPPFLAGS="$CPPFLAGS -I$GMPINCLUDE"
-   GACFLAGS="$GACFLAGS -p -I$GMPINCLUDE"
-fi
-AC_CHECK_HEADER(gmp.h,[],[AC_MSG_ERROR([library gmp not found. Specify its location using --with-gmp])],[])
-
-# buggy darwin doesn't chain the dll requirements to gmp; we include it again
-if test "$GMPLIB" != ""; then
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$GMPLIB -L -Wl,-rpath,$GMPLIB"
-fi
-MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lgmp"
-
-# check mpfr presence
-if test "$MPFRINCLUDE" != ""; then
-   CPPFLAGS="$CPPFLAGS -I$MPFRINCLUDE"
-   GACFLAGS="$GACFLAGS -p -I$MPFRINCLUDE"
-fi
-if test "$MPFRDIR" == "$EXTERN"; then
-   LIB_TARGET="$LIB_TARGET mpfrlib"
-else
-   AC_CHECK_HEADER(mpfr.h,[],[AC_MSG_ERROR([library mpfr not found. Specify its location, or disable it using --without-mpfr])],[])
-fi
-GACFLAGS="$GACFLAGS -p -DWITH_MPFR"
-if test "$MPFRLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPFRLIB -L -Wl,-rpath,$MPFRLIB"; fi
-MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpfr"
-MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpfr.o"
-
-# check mpfi presence
-if test "$MPFIDIR" != no; then
-   if test "$MPFIINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$MPFIINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$MPFIINCLUDE"
-   fi
-   if test "$MPFIDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET mpfilib"
-   else
-      AC_CHECK_HEADER(mpfi.h,[],[AC_MSG_ERROR([library mpfi not found. Specify its location, or disable it using --without-mpfi])],[#include <mpfr.h>])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_MPFI"
-   if test "$MPFILIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPFILIB -L -Wl,-rpath,$MPFILIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpfi"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpfi.o"
-fi
-
-# check mpc presence
-if test "$MPCDIR" != no; then
-   if test "$MPCINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$MPCINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$MPCINCLUDE"
-   fi
-   if test "$MPCDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET mpclib"
-   else
-      AC_CHECK_HEADER(mpc.h,[],[AC_MSG_ERROR([library mpc not found. Specify its location, or disable it using --without-mpc])],[#include <mpfr.h>])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_MPC"
-   if test "$MPCLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPCLIB -L -Wl,-rpath,$MPCLIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpc"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpc.o \$(LOCALBIN)/mp_poly.o"
-fi
-
-# check fplll presence
-if test "$FPLLLDIR" != no; then
-   if test "$FPLLLINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$FPLLLINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$FPLLLINCLUDE"
-   fi
-   if test "$FPLLLDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET fpllllib"
-   else
-      AC_CHECK_HEADER(fplll.h,[],[AC_MSG_ERROR([library fplll not found. Specify its location, or disable it using --without-fplll])],[#include <mpfr.h>])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_FPLLL"
-   if test "$FPLLLLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$FPLLLLIB -L -Wl,-rpath,$FPLLLLIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lfplll"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/fplll.o"
-fi
-
-fi
-
-################################################################
-# make target cxsc
-
-if test "$CXSCDIR" != no; then
-   CXSC_FLOAT_LIB=""
-   CXSC_FLOAT_O=""
-
-   if test "CXSCINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$CXSCINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$CXSCINCLUDE"
-   fi
-   if test "$CXSCDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET cxsclib"
-   else
-      AC_LANG([C++])
-      AC_CHECK_HEADER(interval.hpp,[],[AC_MSG_ERROR([library cxsc not found. Specify its location, or disable using --without-cxsc])],[])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_CXSC"
-   DLL_TARGET="$DLL_TARGET \$(LOCALBIN)/cxsc_float.so"
-   CXSC_FLOAT_O="\$(LOCALBIN)/cxsc_float.o \$(LOCALBIN)/cxsc_poly.o"
-   if test "$CXSCLIB" != ""; then CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L -L$CXSCLIB -L -Wl,-rpath,$CXSCLIB"; fi
-   if echo "$TARGET" | grep -qi darwin; then # buggy darwin, can't include dll
-      CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L $CXSCLIB/libcxsc.a"
-   else
-      CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L -lcxsc"
-   fi
-fi
-
-################################################################
-# generate files
-
-WITHGMP=""
-INCLGMP=""
-LINKGMP=""
-if test "$GMPINCLUDE" != ""; then
-   WITHGMP="$WITHGMP --with-gmp-include=$GMPINCLUDE"
-   INCLGMP="-I$GMPINCLUDE"
-fi
-if test "$GMPLIB" != ""; then
-   WITHGMP="$WITHGMP --with-gmp-lib=$GMPLIB"
-   LINKGMP="-L$GMPLIB"
-fi
-WITHMPFR=""
-INCLMPFR=""
-LINKMPFR=""
-if test "$MPFRINCLUDE" != ""; then
-   WITHMPFR="$WITHMPFR --with-mpfr-include=$MPFRINCLUDE"
-   INCLMPFR="-I$MPFRINCLUDE"
-fi
-if test "$MPFRLIB" != ""; then
-   WITHMPFR="$WITHMPFR --with-mpfr-lib=$MPFRLIB"
-   LINKMPFR="-L$MPFRLIB"
-fi
-
-# prevent parallel make on mpfr, mpc, mpfi before mpfr is compiled
-if test "$MPFRDIR" == "$EXTERN"; then MPFRDEPEND=mpfrlib; fi
-
-AC_SUBST(GAC)
-AC_SUBST(GAP)
-AC_SUBST(CC)
-AC_SUBST(CXX)
-AC_SUBST(CFLAGS)
-AC_SUBST(GAPDIR)
-AC_SUBST(TARGET)
-AC_SUBST(DLL_TARGET)
-AC_SUBST(LIB_TARGET)
-AC_SUBST(MP_FLOAT_LIB)
-AC_SUBST(MP_FLOAT_O)
-AC_SUBST(CXSC_FLOAT_LIB)
-AC_SUBST(CXSC_FLOAT_O)
-AC_SUBST(GACFLAGS)
-AC_SUBST(WITHGMP)
-AC_SUBST(INCLGMP)
-AC_SUBST(LINKGMP)
-AC_SUBST(WITHMPFR)
-AC_SUBST(INCLMPFR)
-AC_SUBST(LINKMPFR)
-AC_SUBST(MPFRDEPEND)
-
-mkdir -p bin/$TARGET
-CONFIG_STATUS=bin/$TARGET/config.status
-
-AC_CHECK_FUNCS([gethostbyname  memset mkdir  rmdir  signal    unlink link rename symlink readlink accept bind chmod  dup fchmod fchown stat fstat lstat   lstat gettimeofday gmtime localtime getpid getppid kill gethostname getsockname])
-
-
-AC_CYGWIN
-AM_CONDITIONAL([SYS_IS_CYGWIN], [test "$CYGWIN" = "yes"])
-if test "$CYGWIN" = "yes"; then
-  AC_DEFINE(SYS_IS_CYGWIN32, 1, are we on CYGWIN?)
-else
-  AC_DEFINE(SYS_IS_CYGWIN32, 0, are we on CYGWIN?)
-fi
-
-
-
-case "$host" in
-        *-darwin* )
-        AC_DEFINE(SYS_IS_DARWIN, 1, are we on DARWIN?)
-        ;;
-        * )
-        AC_DEFINE(SYS_IS_DARWIN, 0, are we on DARWIN?)
-        ;;
-esac
-     
-AC_CONFIG_FILES([Makefile])
-
-
-#AC_CONFIG_FILES([$MAKEFILE:cnf/Makefile.am])
-
-#if test "$MAKEFILE" != Makefile; then
-#   ln -sf "$MAKEFILE" Makefile
-#fi
-
-AC_OUTPUT
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/depcomp b/sandbox/hurwitz.kroeker/src/float/cnf/depcomp
deleted file mode 100755
index bd0ac08..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/depcomp
+++ /dev/null
@@ -1,688 +0,0 @@
-#! /bin/sh
-# depcomp - compile a program generating dependencies as side-effects
-
-scriptversion=2011-12-04.11; # UTC
-
-# Copyright (C) 1999, 2000, 2003, 2004, 2005, 2006, 2007, 2009, 2010,
-# 2011 Free Software Foundation, Inc.
-
-# This program is free software; you can redistribute it and/or modify
-# it under the terms of the GNU General Public License as published by
-# the Free Software Foundation; either version 2, or (at your option)
-# any later version.
-
-# This program is distributed in the hope that it will be useful,
-# but WITHOUT ANY WARRANTY; without even the implied warranty of
-# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
-# GNU General Public License for more details.
-
-# You should have received a copy of the GNU General Public License
-# along with this program.  If not, see <http://www.gnu.org/licenses/>.
-
-# As a special exception to the GNU General Public License, if you
-# distribute this file as part of a program that contains a
-# configuration script generated by Autoconf, you may include it under
-# the same distribution terms that you use for the rest of that program.
-
-# Originally written by Alexandre Oliva <oliva@dcc.unicamp.br>.
-
-case $1 in
-  '')
-     echo "$0: No command.  Try \`$0 --help' for more information." 1>&2
-     exit 1;
-     ;;
-  -h | --h*)
-    cat <<\EOF
-Usage: depcomp [--help] [--version] PROGRAM [ARGS]
-
-Run PROGRAMS ARGS to compile a file, generating dependencies
-as side-effects.
-
-Environment variables:
-  depmode     Dependency tracking mode.
-  source      Source file read by `PROGRAMS ARGS'.
-  object      Object file output by `PROGRAMS ARGS'.
-  DEPDIR      directory where to store dependencies.
-  depfile     Dependency file to output.
-  tmpdepfile  Temporary file to use when outputting dependencies.
-  libtool     Whether libtool is used (yes/no).
-
-Report bugs to <bug-automake@gnu.org>.
-EOF
-    exit $?
-    ;;
-  -v | --v*)
-    echo "depcomp $scriptversion"
-    exit $?
-    ;;
-esac
-
-if test -z "$depmode" || test -z "$source" || test -z "$object"; then
-  echo "depcomp: Variables source, object and depmode must be set" 1>&2
-  exit 1
-fi
-
-# Dependencies for sub/bar.o or sub/bar.obj go into sub/.deps/bar.Po.
-depfile=${depfile-`echo "$object" |
-  sed 's|[^\\/]*$|'${DEPDIR-.deps}'/&|;s|\.\([^.]*\)$|.P\1|;s|Pobj$|Po|'`}
-tmpdepfile=${tmpdepfile-`echo "$depfile" | sed 's/\.\([^.]*\)$/.T\1/'`}
-
-rm -f "$tmpdepfile"
-
-# Some modes work just like other modes, but use different flags.  We
-# parameterize here, but still list the modes in the big case below,
-# to make depend.m4 easier to write.  Note that we *cannot* use a case
-# here, because this file can only contain one case statement.
-if test "$depmode" = hp; then
-  # HP compiler uses -M and no extra arg.
-  gccflag=-M
-  depmode=gcc
-fi
-
-if test "$depmode" = dashXmstdout; then
-   # This is just like dashmstdout with a different argument.
-   dashmflag=-xM
-   depmode=dashmstdout
-fi
-
-cygpath_u="cygpath -u -f -"
-if test "$depmode" = msvcmsys; then
-   # This is just like msvisualcpp but w/o cygpath translation.
-   # Just convert the backslash-escaped backslashes to single forward
-   # slashes to satisfy depend.m4
-   cygpath_u='sed s,\\\\,/,g'
-   depmode=msvisualcpp
-fi
-
-if test "$depmode" = msvc7msys; then
-   # This is just like msvc7 but w/o cygpath translation.
-   # Just convert the backslash-escaped backslashes to single forward
-   # slashes to satisfy depend.m4
-   cygpath_u='sed s,\\\\,/,g'
-   depmode=msvc7
-fi
-
-case "$depmode" in
-gcc3)
-## gcc 3 implements dependency tracking that does exactly what
-## we want.  Yay!  Note: for some reason libtool 1.4 doesn't like
-## it if -MD -MP comes after the -MF stuff.  Hmm.
-## Unfortunately, FreeBSD c89 acceptance of flags depends upon
-## the command line argument order; so add the flags where they
-## appear in depend2.am.  Note that the slowdown incurred here
-## affects only configure: in makefiles, %FASTDEP% shortcuts this.
-  for arg
-  do
-    case $arg in
-    -c) set fnord "$@" -MT "$object" -MD -MP -MF "$tmpdepfile" "$arg" ;;
-    *)  set fnord "$@" "$arg" ;;
-    esac
-    shift # fnord
-    shift # $arg
-  done
-  "$@"
-  stat=$?
-  if test $stat -eq 0; then :
-  else
-    rm -f "$tmpdepfile"
-    exit $stat
-  fi
-  mv "$tmpdepfile" "$depfile"
-  ;;
-
-gcc)
-## There are various ways to get dependency output from gcc.  Here's
-## why we pick this rather obscure method:
-## - Don't want to use -MD because we'd like the dependencies to end
-##   up in a subdir.  Having to rename by hand is ugly.
-##   (We might end up doing this anyway to support other compilers.)
-## - The DEPENDENCIES_OUTPUT environment variable makes gcc act like
-##   -MM, not -M (despite what the docs say).
-## - Using -M directly means running the compiler twice (even worse
-##   than renaming).
-  if test -z "$gccflag"; then
-    gccflag=-MD,
-  fi
-  "$@" -Wp,"$gccflag$tmpdepfile"
-  stat=$?
-  if test $stat -eq 0; then :
-  else
-    rm -f "$tmpdepfile"
-    exit $stat
-  fi
-  rm -f "$depfile"
-  echo "$object : \\" > "$depfile"
-  alpha=ABCDEFGHIJKLMNOPQRSTUVWXYZabcdefghijklmnopqrstuvwxyz
-## The second -e expression handles DOS-style file names with drive letters.
-  sed -e 's/^[^:]*: / /' \
-      -e 's/^['$alpha']:\/[^:]*: / /' < "$tmpdepfile" >> "$depfile"
-## This next piece of magic avoids the `deleted header file' problem.
-## The problem is that when a header file which appears in a .P file
-## is deleted, the dependency causes make to die (because there is
-## typically no way to rebuild the header).  We avoid this by adding
-## dummy dependencies for each header file.  Too bad gcc doesn't do
-## this for us directly.
-  tr ' ' '
-' < "$tmpdepfile" |
-## Some versions of gcc put a space before the `:'.  On the theory
-## that the space means something, we add a space to the output as
-## well.  hp depmode also adds that space, but also prefixes the VPATH
-## to the object.  Take care to not repeat it in the output.
-## Some versions of the HPUX 10.20 sed can't process this invocation
-## correctly.  Breaking it into two sed invocations is a workaround.
-    sed -e 's/^\\$//' -e '/^$/d' -e "s|.*$object$||" -e '/:$/d' \
-      | sed -e 's/$/ :/' >> "$depfile"
-  rm -f "$tmpdepfile"
-  ;;
-
-hp)
-  # This case exists only to let depend.m4 do its work.  It works by
-  # looking at the text of this script.  This case will never be run,
-  # since it is checked for above.
-  exit 1
-  ;;
-
-sgi)
-  if test "$libtool" = yes; then
-    "$@" "-Wp,-MDupdate,$tmpdepfile"
-  else
-    "$@" -MDupdate "$tmpdepfile"
-  fi
-  stat=$?
-  if test $stat -eq 0; then :
-  else
-    rm -f "$tmpdepfile"
-    exit $stat
-  fi
-  rm -f "$depfile"
-
-  if test -f "$tmpdepfile"; then  # yes, the sourcefile depend on other files
-    echo "$object : \\" > "$depfile"
-
-    # Clip off the initial element (the dependent).  Don't try to be
-    # clever and replace this with sed code, as IRIX sed won't handle
-    # lines with more than a fixed number of characters (4096 in
-    # IRIX 6.2 sed, 8192 in IRIX 6.5).  We also remove comment lines;
-    # the IRIX cc adds comments like `#:fec' to the end of the
-    # dependency line.
-    tr ' ' '
-' < "$tmpdepfile" \
-    | sed -e 's/^.*\.o://' -e 's/#.*$//' -e '/^$/ d' | \
-    tr '
-' ' ' >> "$depfile"
-    echo >> "$depfile"
-
-    # The second pass generates a dummy entry for each header file.
-    tr ' ' '
-' < "$tmpdepfile" \
-   | sed -e 's/^.*\.o://' -e 's/#.*$//' -e '/^$/ d' -e 's/$/:/' \
-   >> "$depfile"
-  else
-    # The sourcefile does not contain any dependencies, so just
-    # store a dummy comment line, to avoid errors with the Makefile
-    # "include basename.Plo" scheme.
-    echo "#dummy" > "$depfile"
-  fi
-  rm -f "$tmpdepfile"
-  ;;
-
-aix)
-  # The C for AIX Compiler uses -M and outputs the dependencies
-  # in a .u file.  In older versions, this file always lives in the
-  # current directory.  Also, the AIX compiler puts `$object:' at the
-  # start of each line; $object doesn't have directory information.
-  # Version 6 uses the directory in both cases.
-  dir=`echo "$object" | sed -e 's|/[^/]*$|/|'`
-  test "x$dir" = "x$object" && dir=
-  base=`echo "$object" | sed -e 's|^.*/||' -e 's/\.o$//' -e 's/\.lo$//'`
-  if test "$libtool" = yes; then
-    tmpdepfile1=$dir$base.u
-    tmpdepfile2=$base.u
-    tmpdepfile3=$dir.libs/$base.u
-    "$@" -Wc,-M
-  else
-    tmpdepfile1=$dir$base.u
-    tmpdepfile2=$dir$base.u
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diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/install-sh b/sandbox/hurwitz.kroeker/src/float/cnf/install-sh
deleted file mode 100755
index a9244eb..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/install-sh
+++ /dev/null
@@ -1,527 +0,0 @@
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-  esac
-fi
-
-for src
-do
-  # Protect names problematic for `test' and other utilities.
-  case $src in
-    -* | [=\(\)!]) src=./$src;;
-  esac
-
-  if test -n "$dir_arg"; then
-    dst=$src
-    dstdir=$dst
-    test -d "$dstdir"
-    dstdir_status=$?
-  else
-
-    # Waiting for this to be detected by the "$cpprog $src $dsttmp" command
-    # might cause directories to be created, which would be especially bad
-    # if $src (and thus $dsttmp) contains '*'.
-    if test ! -f "$src" && test ! -d "$src"; then
-      echo "$0: $src does not exist." >&2
-      exit 1
-    fi
-
-    if test -z "$dst_arg"; then
-      echo "$0: no destination specified." >&2
-      exit 1
-    fi
-    dst=$dst_arg
-
-    # If destination is a directory, append the input filename; won't work
-    # if double slashes aren't ignored.
-    if test -d "$dst"; then
-      if test -n "$no_target_directory"; then
-	echo "$0: $dst_arg: Is a directory" >&2
-	exit 1
-      fi
-      dstdir=$dst
-      dst=$dstdir/`basename "$src"`
-      dstdir_status=0
-    else
-      # Prefer dirname, but fall back on a substitute if dirname fails.
-      dstdir=`
-	(dirname "$dst") 2>/dev/null ||
-	expr X"$dst" : 'X\(.*[^/]\)//*[^/][^/]*/*$' \| \
-	     X"$dst" : 'X\(//\)[^/]' \| \
-	     X"$dst" : 'X\(//\)$' \| \
-	     X"$dst" : 'X\(/\)' \| . 2>/dev/null ||
-	echo X"$dst" |
-	    sed '/^X\(.*[^/]\)\/\/*[^/][^/]*\/*$/{
-		   s//\1/
-		   q
-		 }
-		 /^X\(\/\/\)[^/].*/{
-		   s//\1/
-		   q
-		 }
-		 /^X\(\/\/\)$/{
-		   s//\1/
-		   q
-		 }
-		 /^X\(\/\).*/{
-		   s//\1/
-		   q
-		 }
-		 s/.*/./; q'
-      `
-
-      test -d "$dstdir"
-      dstdir_status=$?
-    fi
-  fi
-
-  obsolete_mkdir_used=false
-
-  if test $dstdir_status != 0; then
-    case $posix_mkdir in
-      '')
-	# Create intermediate dirs using mode 755 as modified by the umask.
-	# This is like FreeBSD 'install' as of 1997-10-28.
-	umask=`umask`
-	case $stripcmd.$umask in
-	  # Optimize common cases.
-	  *[2367][2367]) mkdir_umask=$umask;;
-	  .*0[02][02] | .[02][02] | .[02]) mkdir_umask=22;;
-
-	  *[0-7])
-	    mkdir_umask=`expr $umask + 22 \
-	      - $umask % 100 % 40 + $umask % 20 \
-	      - $umask % 10 % 4 + $umask % 2
-	    `;;
-	  *) mkdir_umask=$umask,go-w;;
-	esac
-
-	# With -d, create the new directory with the user-specified mode.
-	# Otherwise, rely on $mkdir_umask.
-	if test -n "$dir_arg"; then
-	  mkdir_mode=-m$mode
-	else
-	  mkdir_mode=
-	fi
-
-	posix_mkdir=false
-	case $umask in
-	  *[123567][0-7][0-7])
-	    # POSIX mkdir -p sets u+wx bits regardless of umask, which
-	    # is incompatible with FreeBSD 'install' when (umask & 300) != 0.
-	    ;;
-	  *)
-	    tmpdir=${TMPDIR-/tmp}/ins$RANDOM-$$
-	    trap 'ret=$?; rmdir "$tmpdir/d" "$tmpdir" 2>/dev/null; exit $ret' 0
-
-	    if (umask $mkdir_umask &&
-		exec $mkdirprog $mkdir_mode -p -- "$tmpdir/d") >/dev/null 2>&1
-	    then
-	      if test -z "$dir_arg" || {
-		   # Check for POSIX incompatibilities with -m.
-		   # HP-UX 11.23 and IRIX 6.5 mkdir -m -p sets group- or
-		   # other-writeable bit of parent directory when it shouldn't.
-		   # FreeBSD 6.1 mkdir -m -p sets mode of existing directory.
-		   ls_ld_tmpdir=`ls -ld "$tmpdir"`
-		   case $ls_ld_tmpdir in
-		     d????-?r-*) different_mode=700;;
-		     d????-?--*) different_mode=755;;
-		     *) false;;
-		   esac &&
-		   $mkdirprog -m$different_mode -p -- "$tmpdir" && {
-		     ls_ld_tmpdir_1=`ls -ld "$tmpdir"`
-		     test "$ls_ld_tmpdir" = "$ls_ld_tmpdir_1"
-		   }
-		 }
-	      then posix_mkdir=:
-	      fi
-	      rmdir "$tmpdir/d" "$tmpdir"
-	    else
-	      # Remove any dirs left behind by ancient mkdir implementations.
-	      rmdir ./$mkdir_mode ./-p ./-- 2>/dev/null
-	    fi
-	    trap '' 0;;
-	esac;;
-    esac
-
-    if
-      $posix_mkdir && (
-	umask $mkdir_umask &&
-	$doit_exec $mkdirprog $mkdir_mode -p -- "$dstdir"
-      )
-    then :
-    else
-
-      # The umask is ridiculous, or mkdir does not conform to POSIX,
-      # or it failed possibly due to a race condition.  Create the
-      # directory the slow way, step by step, checking for races as we go.
-
-      case $dstdir in
-	/*) prefix='/';;
-	[-=\(\)!]*) prefix='./';;
-	*)  prefix='';;
-      esac
-
-      eval "$initialize_posix_glob"
-
-      oIFS=$IFS
-      IFS=/
-      $posix_glob set -f
-      set fnord $dstdir
-      shift
-      $posix_glob set +f
-      IFS=$oIFS
-
-      prefixes=
-
-      for d
-      do
-	test X"$d" = X && continue
-
-	prefix=$prefix$d
-	if test -d "$prefix"; then
-	  prefixes=
-	else
-	  if $posix_mkdir; then
-	    (umask=$mkdir_umask &&
-	     $doit_exec $mkdirprog $mkdir_mode -p -- "$dstdir") && break
-	    # Don't fail if two instances are running concurrently.
-	    test -d "$prefix" || exit 1
-	  else
-	    case $prefix in
-	      *\'*) qprefix=`echo "$prefix" | sed "s/'/'\\\\\\\\''/g"`;;
-	      *) qprefix=$prefix;;
-	    esac
-	    prefixes="$prefixes '$qprefix'"
-	  fi
-	fi
-	prefix=$prefix/
-      done
-
-      if test -n "$prefixes"; then
-	# Don't fail if two instances are running concurrently.
-	(umask $mkdir_umask &&
-	 eval "\$doit_exec \$mkdirprog $prefixes") ||
-	  test -d "$dstdir" || exit 1
-	obsolete_mkdir_used=true
-      fi
-    fi
-  fi
-
-  if test -n "$dir_arg"; then
-    { test -z "$chowncmd" || $doit $chowncmd "$dst"; } &&
-    { test -z "$chgrpcmd" || $doit $chgrpcmd "$dst"; } &&
-    { test "$obsolete_mkdir_used$chowncmd$chgrpcmd" = false ||
-      test -z "$chmodcmd" || $doit $chmodcmd $mode "$dst"; } || exit 1
-  else
-
-    # Make a couple of temp file names in the proper directory.
-    dsttmp=$dstdir/_inst.$$_
-    rmtmp=$dstdir/_rm.$$_
-
-    # Trap to clean up those temp files at exit.
-    trap 'ret=$?; rm -f "$dsttmp" "$rmtmp" && exit $ret' 0
-
-    # Copy the file name to the temp name.
-    (umask $cp_umask && $doit_exec $cpprog "$src" "$dsttmp") &&
-
-    # and set any options; do chmod last to preserve setuid bits.
-    #
-    # If any of these fail, we abort the whole thing.  If we want to
-    # ignore errors from any of these, just make sure not to ignore
-    # errors from the above "$doit $cpprog $src $dsttmp" command.
-    #
-    { test -z "$chowncmd" || $doit $chowncmd "$dsttmp"; } &&
-    { test -z "$chgrpcmd" || $doit $chgrpcmd "$dsttmp"; } &&
-    { test -z "$stripcmd" || $doit $stripcmd "$dsttmp"; } &&
-    { test -z "$chmodcmd" || $doit $chmodcmd $mode "$dsttmp"; } &&
-
-    # If -C, don't bother to copy if it wouldn't change the file.
-    if $copy_on_change &&
-       old=`LC_ALL=C ls -dlL "$dst"	2>/dev/null` &&
-       new=`LC_ALL=C ls -dlL "$dsttmp"	2>/dev/null` &&
-
-       eval "$initialize_posix_glob" &&
-       $posix_glob set -f &&
-       set X $old && old=:$2:$4:$5:$6 &&
-       set X $new && new=:$2:$4:$5:$6 &&
-       $posix_glob set +f &&
-
-       test "$old" = "$new" &&
-       $cmpprog "$dst" "$dsttmp" >/dev/null 2>&1
-    then
-      rm -f "$dsttmp"
-    else
-      # Rename the file to the real destination.
-      $doit $mvcmd -f "$dsttmp" "$dst" 2>/dev/null ||
-
-      # The rename failed, perhaps because mv can't rename something else
-      # to itself, or perhaps because mv is so ancient that it does not
-      # support -f.
-      {
-	# Now remove or move aside any old file at destination location.
-	# We try this two ways since rm can't unlink itself on some
-	# systems and the destination file might be busy for other
-	# reasons.  In this case, the final cleanup might fail but the new
-	# file should still install successfully.
-	{
-	  test ! -f "$dst" ||
-	  $doit $rmcmd -f "$dst" 2>/dev/null ||
-	  { $doit $mvcmd -f "$dst" "$rmtmp" 2>/dev/null &&
-	    { $doit $rmcmd -f "$rmtmp" 2>/dev/null; :; }
-	  } ||
-	  { echo "$0: cannot unlink or rename $dst" >&2
-	    (exit 1); exit 1
-	  }
-	} &&
-
-	# Now rename the file to the real destination.
-	$doit $mvcmd "$dsttmp" "$dst"
-      }
-    fi || exit 1
-
-    trap '' 0
-  fi
-done
-
-# Local variables:
-# eval: (add-hook 'write-file-hooks 'time-stamp)
-# time-stamp-start: "scriptversion="
-# time-stamp-format: "%:y-%02m-%02d.%02H"
-# time-stamp-time-zone: "UTC"
-# time-stamp-end: "; # UTC"
-# End:
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/ltmain.sh b/sandbox/hurwitz.kroeker/src/float/cnf/ltmain.sh
deleted file mode 100644
index 63ae69d..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/ltmain.sh
+++ /dev/null
@@ -1,9655 +0,0 @@
-
-# libtool (GNU libtool) 2.4.2
-# Written by Gordon Matzigkeit <gord@gnu.ai.mit.edu>, 1996
-
-# Copyright (C) 1996, 1997, 1998, 1999, 2000, 2001, 2003, 2004, 2005, 2006,
-# 2007, 2008, 2009, 2010, 2011 Free Software Foundation, Inc.
-# This is free software; see the source for copying conditions.  There is NO
-# warranty; not even for MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.
-
-# GNU Libtool is free software; you can redistribute it and/or modify
-# it under the terms of the GNU General Public License as published by
-# the Free Software Foundation; either version 2 of the License, or
-# (at your option) any later version.
-#
-# As a special exception to the GNU General Public License,
-# if you distribute this file as part of a program or library that
-# is built using GNU Libtool, you may include this file under the
-# same distribution terms that you use for the rest of that program.
-#
-# GNU Libtool is distributed in the hope that it will be useful, but
-# WITHOUT ANY WARRANTY; without even the implied warranty of
-# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU
-# General Public License for more details.
-#
-# You should have received a copy of the GNU General Public License
-# along with GNU Libtool; see the file COPYING.  If not, a copy
-# can be downloaded from http://www.gnu.org/licenses/gpl.html,
-# or obtained by writing to the Free Software Foundation, Inc.,
-# 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301, USA.
-
-# Usage: $progname [OPTION]... [MODE-ARG]...
-#
-# Provide generalized library-building support services.
-#
-#       --config             show all configuration variables
-#       --debug              enable verbose shell tracing
-#   -n, --dry-run            display commands without modifying any files
-#       --features           display basic configuration information and exit
-#       --mode=MODE          use operation mode MODE
-#       --preserve-dup-deps  don't remove duplicate dependency libraries
-#       --quiet, --silent    don't print informational messages
-#       --no-quiet, --no-silent
-#                            print informational messages (default)
-#       --no-warn            don't display warning messages
-#       --tag=TAG            use configuration variables from tag TAG
-#   -v, --verbose            print more informational messages than default
-#       --no-verbose         don't print the extra informational messages
-#       --version            print version information
-#   -h, --help, --help-all   print short, long, or detailed help message
-#
-# MODE must be one of the following:
-#
-#         clean              remove files from the build directory
-#         compile            compile a source file into a libtool object
-#         execute            automatically set library path, then run a program
-#         finish             complete the installation of libtool libraries
-#         install            install libraries or executables
-#         link               create a library or an executable
-#         uninstall          remove libraries from an installed directory
-#
-# MODE-ARGS vary depending on the MODE.  When passed as first option,
-# `--mode=MODE' may be abbreviated as `MODE' or a unique abbreviation of that.
-# Try `$progname --help --mode=MODE' for a more detailed description of MODE.
-#
-# When reporting a bug, please describe a test case to reproduce it and
-# include the following information:
-#
-#         host-triplet:	$host
-#         shell:		$SHELL
-#         compiler:		$LTCC
-#         compiler flags:		$LTCFLAGS
-#         linker:		$LD (gnu? $with_gnu_ld)
-#         $progname:	(GNU libtool) 2.4.2
-#         automake:	$automake_version
-#         autoconf:	$autoconf_version
-#
-# Report bugs to <bug-libtool@gnu.org>.
-# GNU libtool home page: <http://www.gnu.org/software/libtool/>.
-# General help using GNU software: <http://www.gnu.org/gethelp/>.
-
-PROGRAM=libtool
-PACKAGE=libtool
-VERSION=2.4.2
-TIMESTAMP=""
-package_revision=1.3337
-
-# Be Bourne compatible
-if test -n "${ZSH_VERSION+set}" && (emulate sh) >/dev/null 2>&1; then
-  emulate sh
-  NULLCMD=:
-  # Zsh 3.x and 4.x performs word splitting on ${1+"$@"}, which
-  # is contrary to our usage.  Disable this feature.
-  alias -g '${1+"$@"}'='"$@"'
-  setopt NO_GLOB_SUBST
-else
-  case `(set -o) 2>/dev/null` in *posix*) set -o posix;; esac
-fi
-BIN_SH=xpg4; export BIN_SH # for Tru64
-DUALCASE=1; export DUALCASE # for MKS sh
-
-# A function that is used when there is no print builtin or printf.
-func_fallback_echo ()
-{
-  eval 'cat <<_LTECHO_EOF
-$1
-_LTECHO_EOF'
-}
-
-# NLS nuisances: We save the old values to restore during execute mode.
-lt_user_locale=
-lt_safe_locale=
-for lt_var in LANG LANGUAGE LC_ALL LC_CTYPE LC_COLLATE LC_MESSAGES
-do
-  eval "if test \"\${$lt_var+set}\" = set; then
-          save_$lt_var=\$$lt_var
-          $lt_var=C
-	  export $lt_var
-	  lt_user_locale=\"$lt_var=\\\$save_\$lt_var; \$lt_user_locale\"
-	  lt_safe_locale=\"$lt_var=C; \$lt_safe_locale\"
-	fi"
-done
-LC_ALL=C
-LANGUAGE=C
-export LANGUAGE LC_ALL
-
-$lt_unset CDPATH
-
-
-# Work around backward compatibility issue on IRIX 6.5. On IRIX 6.4+, sh
-# is ksh but when the shell is invoked as "sh" and the current value of
-# the _XPG environment variable is not equal to 1 (one), the special
-# positional parameter $0, within a function call, is the name of the
-# function.
-progpath="$0"
-
-
-
-: ${CP="cp -f"}
-test "${ECHO+set}" = set || ECHO=${as_echo-'printf %s\n'}
-: ${MAKE="make"}
-: ${MKDIR="mkdir"}
-: ${MV="mv -f"}
-: ${RM="rm -f"}
-: ${SHELL="${CONFIG_SHELL-/bin/sh}"}
-: ${Xsed="$SED -e 1s/^X//"}
-
-# Global variables:
-EXIT_SUCCESS=0
-EXIT_FAILURE=1
-EXIT_MISMATCH=63  # $? = 63 is used to indicate version mismatch to missing.
-EXIT_SKIP=77	  # $? = 77 is used to indicate a skipped test to automake.
-
-exit_status=$EXIT_SUCCESS
-
-# Make sure IFS has a sensible default
-lt_nl='
-'
-IFS=" 	$lt_nl"
-
-dirname="s,/[^/]*$,,"
-basename="s,^.*/,,"
-
-# func_dirname file append nondir_replacement
-# Compute the dirname of FILE.  If nonempty, add APPEND to the result,
-# otherwise set result to NONDIR_REPLACEMENT.
-func_dirname ()
-{
-    func_dirname_result=`$ECHO "${1}" | $SED "$dirname"`
-    if test "X$func_dirname_result" = "X${1}"; then
-      func_dirname_result="${3}"
-    else
-      func_dirname_result="$func_dirname_result${2}"
-    fi
-} # func_dirname may be replaced by extended shell implementation
-
-
-# func_basename file
-func_basename ()
-{
-    func_basename_result=`$ECHO "${1}" | $SED "$basename"`
-} # func_basename may be replaced by extended shell implementation
-
-
-# func_dirname_and_basename file append nondir_replacement
-# perform func_basename and func_dirname in a single function
-# call:
-#   dirname:  Compute the dirname of FILE.  If nonempty,
-#             add APPEND to the result, otherwise set result
-#             to NONDIR_REPLACEMENT.
-#             value returned in "$func_dirname_result"
-#   basename: Compute filename of FILE.
-#             value retuned in "$func_basename_result"
-# Implementation must be kept synchronized with func_dirname
-# and func_basename. For efficiency, we do not delegate to
-# those functions but instead duplicate the functionality here.
-func_dirname_and_basename ()
-{
-    # Extract subdirectory from the argument.
-    func_dirname_result=`$ECHO "${1}" | $SED -e "$dirname"`
-    if test "X$func_dirname_result" = "X${1}"; then
-      func_dirname_result="${3}"
-    else
-      func_dirname_result="$func_dirname_result${2}"
-    fi
-    func_basename_result=`$ECHO "${1}" | $SED -e "$basename"`
-} # func_dirname_and_basename may be replaced by extended shell implementation
-
-
-# func_stripname prefix suffix name
-# strip PREFIX and SUFFIX off of NAME.
-# PREFIX and SUFFIX must not contain globbing or regex special
-# characters, hashes, percent signs, but SUFFIX may contain a leading
-# dot (in which case that matches only a dot).
-# func_strip_suffix prefix name
-func_stripname ()
-{
-    case ${2} in
-      .*) func_stripname_result=`$ECHO "${3}" | $SED "s%^${1}%%; s%\\\\${2}\$%%"`;;
-      *)  func_stripname_result=`$ECHO "${3}" | $SED "s%^${1}%%; s%${2}\$%%"`;;
-    esac
-} # func_stripname may be replaced by extended shell implementation
-
-
-# These SED scripts presuppose an absolute path with a trailing slash.
-pathcar='s,^/\([^/]*\).*$,\1,'
-pathcdr='s,^/[^/]*,,'
-removedotparts=':dotsl
-		s@/\./@/@g
-		t dotsl
-		s,/\.$,/,'
-collapseslashes='s@/\{1,\}@/@g'
-finalslash='s,/*$,/,'
-
-# func_normal_abspath PATH
-# Remove doubled-up and trailing slashes, "." path components,
-# and cancel out any ".." path components in PATH after making
-# it an absolute path.
-#             value returned in "$func_normal_abspath_result"
-func_normal_abspath ()
-{
-  # Start from root dir and reassemble the path.
-  func_normal_abspath_result=
-  func_normal_abspath_tpath=$1
-  func_normal_abspath_altnamespace=
-  case $func_normal_abspath_tpath in
-    "")
-      # Empty path, that just means $cwd.
-      func_stripname '' '/' "`pwd`"
-      func_normal_abspath_result=$func_stripname_result
-      return
-    ;;
-    # The next three entries are used to spot a run of precisely
-    # two leading slashes without using negated character classes;
-    # we take advantage of case's first-match behaviour.
-    ///*)
-      # Unusual form of absolute path, do nothing.
-    ;;
-    //*)
-      # Not necessarily an ordinary path; POSIX reserves leading '//'
-      # and for example Cygwin uses it to access remote file shares
-      # over CIFS/SMB, so we conserve a leading double slash if found.
-      func_normal_abspath_altnamespace=/
-    ;;
-    /*)
-      # Absolute path, do nothing.
-    ;;
-    *)
-      # Relative path, prepend $cwd.
-      func_normal_abspath_tpath=`pwd`/$func_normal_abspath_tpath
-    ;;
-  esac
-  # Cancel out all the simple stuff to save iterations.  We also want
-  # the path to end with a slash for ease of parsing, so make sure
-  # there is one (and only one) here.
-  func_normal_abspath_tpath=`$ECHO "$func_normal_abspath_tpath" | $SED \
-        -e "$removedotparts" -e "$collapseslashes" -e "$finalslash"`
-  while :; do
-    # Processed it all yet?
-    if test "$func_normal_abspath_tpath" = / ; then
-      # If we ascended to the root using ".." the result may be empty now.
-      if test -z "$func_normal_abspath_result" ; then
-        func_normal_abspath_result=/
-      fi
-      break
-    fi
-    func_normal_abspath_tcomponent=`$ECHO "$func_normal_abspath_tpath" | $SED \
-        -e "$pathcar"`
-    func_normal_abspath_tpath=`$ECHO "$func_normal_abspath_tpath" | $SED \
-        -e "$pathcdr"`
-    # Figure out what to do with it
-    case $func_normal_abspath_tcomponent in
-      "")
-        # Trailing empty path component, ignore it.
-      ;;
-      ..)
-        # Parent dir; strip last assembled component from result.
-        func_dirname "$func_normal_abspath_result"
-        func_normal_abspath_result=$func_dirname_result
-      ;;
-      *)
-        # Actual path component, append it.
-        func_normal_abspath_result=$func_normal_abspath_result/$func_normal_abspath_tcomponent
-      ;;
-    esac
-  done
-  # Restore leading double-slash if one was found on entry.
-  func_normal_abspath_result=$func_normal_abspath_altnamespace$func_normal_abspath_result
-}
-
-# func_relative_path SRCDIR DSTDIR
-# generates a relative path from SRCDIR to DSTDIR, with a trailing
-# slash if non-empty, suitable for immediately appending a filename
-# without needing to append a separator.
-#             value returned in "$func_relative_path_result"
-func_relative_path ()
-{
-  func_relative_path_result=
-  func_normal_abspath "$1"
-  func_relative_path_tlibdir=$func_normal_abspath_result
-  func_normal_abspath "$2"
-  func_relative_path_tbindir=$func_normal_abspath_result
-
-  # Ascend the tree starting from libdir
-  while :; do
-    # check if we have found a prefix of bindir
-    case $func_relative_path_tbindir in
-      $func_relative_path_tlibdir)
-        # found an exact match
-        func_relative_path_tcancelled=
-        break
-        ;;
-      $func_relative_path_tlibdir*)
-        # found a matching prefix
-        func_stripname "$func_relative_path_tlibdir" '' "$func_relative_path_tbindir"
-        func_relative_path_tcancelled=$func_stripname_result
-        if test -z "$func_relative_path_result"; then
-          func_relative_path_result=.
-        fi
-        break
-        ;;
-      *)
-        func_dirname $func_relative_path_tlibdir
-        func_relative_path_tlibdir=${func_dirname_result}
-        if test "x$func_relative_path_tlibdir" = x ; then
-          # Have to descend all the way to the root!
-          func_relative_path_result=../$func_relative_path_result
-          func_relative_path_tcancelled=$func_relative_path_tbindir
-          break
-        fi
-        func_relative_path_result=../$func_relative_path_result
-        ;;
-    esac
-  done
-
-  # Now calculate path; take care to avoid doubling-up slashes.
-  func_stripname '' '/' "$func_relative_path_result"
-  func_relative_path_result=$func_stripname_result
-  func_stripname '/' '/' "$func_relative_path_tcancelled"
-  if test "x$func_stripname_result" != x ; then
-    func_relative_path_result=${func_relative_path_result}/${func_stripname_result}
-  fi
-
-  # Normalisation. If bindir is libdir, return empty string,
-  # else relative path ending with a slash; either way, target
-  # file name can be directly appended.
-  if test ! -z "$func_relative_path_result"; then
-    func_stripname './' '' "$func_relative_path_result/"
-    func_relative_path_result=$func_stripname_result
-  fi
-}
-
-# The name of this program:
-func_dirname_and_basename "$progpath"
-progname=$func_basename_result
-
-# Make sure we have an absolute path for reexecution:
-case $progpath in
-  [\\/]*|[A-Za-z]:\\*) ;;
-  *[\\/]*)
-     progdir=$func_dirname_result
-     progdir=`cd "$progdir" && pwd`
-     progpath="$progdir/$progname"
-     ;;
-  *)
-     save_IFS="$IFS"
-     IFS=${PATH_SEPARATOR-:}
-     for progdir in $PATH; do
-       IFS="$save_IFS"
-       test -x "$progdir/$progname" && break
-     done
-     IFS="$save_IFS"
-     test -n "$progdir" || progdir=`pwd`
-     progpath="$progdir/$progname"
-     ;;
-esac
-
-# Sed substitution that helps us do robust quoting.  It backslashifies
-# metacharacters that are still active within double-quoted strings.
-Xsed="${SED}"' -e 1s/^X//'
-sed_quote_subst='s/\([`"$\\]\)/\\\1/g'
-
-# Same as above, but do not quote variable references.
-double_quote_subst='s/\(["`\\]\)/\\\1/g'
-
-# Sed substitution that turns a string into a regex matching for the
-# string literally.
-sed_make_literal_regex='s,[].[^$\\*\/],\\&,g'
-
-# Sed substitution that converts a w32 file name or path
-# which contains forward slashes, into one that contains
-# (escaped) backslashes.  A very naive implementation.
-lt_sed_naive_backslashify='s|\\\\*|\\|g;s|/|\\|g;s|\\|\\\\|g'
-
-# Re-`\' parameter expansions in output of double_quote_subst that were
-# `\'-ed in input to the same.  If an odd number of `\' preceded a '$'
-# in input to double_quote_subst, that '$' was protected from expansion.
-# Since each input `\' is now two `\'s, look for any number of runs of
-# four `\'s followed by two `\'s and then a '$'.  `\' that '$'.
-bs='\\'
-bs2='\\\\'
-bs4='\\\\\\\\'
-dollar='\$'
-sed_double_backslash="\
-  s/$bs4/&\\
-/g
-  s/^$bs2$dollar/$bs&/
-  s/\\([^$bs]\\)$bs2$dollar/\\1$bs2$bs$dollar/g
-  s/\n//g"
-
-# Standard options:
-opt_dry_run=false
-opt_help=false
-opt_quiet=false
-opt_verbose=false
-opt_warning=:
-
-# func_echo arg...
-# Echo program name prefixed message, along with the current mode
-# name if it has been set yet.
-func_echo ()
-{
-    $ECHO "$progname: ${opt_mode+$opt_mode: }$*"
-}
-
-# func_verbose arg...
-# Echo program name prefixed message in verbose mode only.
-func_verbose ()
-{
-    $opt_verbose && func_echo ${1+"$@"}
-
-    # A bug in bash halts the script if the last line of a function
-    # fails when set -e is in force, so we need another command to
-    # work around that:
-    :
-}
-
-# func_echo_all arg...
-# Invoke $ECHO with all args, space-separated.
-func_echo_all ()
-{
-    $ECHO "$*"
-}
-
-# func_error arg...
-# Echo program name prefixed message to standard error.
-func_error ()
-{
-    $ECHO "$progname: ${opt_mode+$opt_mode: }"${1+"$@"} 1>&2
-}
-
-# func_warning arg...
-# Echo program name prefixed warning message to standard error.
-func_warning ()
-{
-    $opt_warning && $ECHO "$progname: ${opt_mode+$opt_mode: }warning: "${1+"$@"} 1>&2
-
-    # bash bug again:
-    :
-}
-
-# func_fatal_error arg...
-# Echo program name prefixed message to standard error, and exit.
-func_fatal_error ()
-{
-    func_error ${1+"$@"}
-    exit $EXIT_FAILURE
-}
-
-# func_fatal_help arg...
-# Echo program name prefixed message to standard error, followed by
-# a help hint, and exit.
-func_fatal_help ()
-{
-    func_error ${1+"$@"}
-    func_fatal_error "$help"
-}
-help="Try \`$progname --help' for more information."  ## default
-
-
-# func_grep expression filename
-# Check whether EXPRESSION matches any line of FILENAME, without output.
-func_grep ()
-{
-    $GREP "$1" "$2" >/dev/null 2>&1
-}
-
-
-# func_mkdir_p directory-path
-# Make sure the entire path to DIRECTORY-PATH is available.
-func_mkdir_p ()
-{
-    my_directory_path="$1"
-    my_dir_list=
-
-    if test -n "$my_directory_path" && test "$opt_dry_run" != ":"; then
-
-      # Protect directory names starting with `-'
-      case $my_directory_path in
-        -*) my_directory_path="./$my_directory_path" ;;
-      esac
-
-      # While some portion of DIR does not yet exist...
-      while test ! -d "$my_directory_path"; do
-        # ...make a list in topmost first order.  Use a colon delimited
-	# list incase some portion of path contains whitespace.
-        my_dir_list="$my_directory_path:$my_dir_list"
-
-        # If the last portion added has no slash in it, the list is done
-        case $my_directory_path in */*) ;; *) break ;; esac
-
-        # ...otherwise throw away the child directory and loop
-        my_directory_path=`$ECHO "$my_directory_path" | $SED -e "$dirname"`
-      done
-      my_dir_list=`$ECHO "$my_dir_list" | $SED 's,:*$,,'`
-
-      save_mkdir_p_IFS="$IFS"; IFS=':'
-      for my_dir in $my_dir_list; do
-	IFS="$save_mkdir_p_IFS"
-        # mkdir can fail with a `File exist' error if two processes
-        # try to create one of the directories concurrently.  Don't
-        # stop in that case!
-        $MKDIR "$my_dir" 2>/dev/null || :
-      done
-      IFS="$save_mkdir_p_IFS"
-
-      # Bail out if we (or some other process) failed to create a directory.
-      test -d "$my_directory_path" || \
-        func_fatal_error "Failed to create \`$1'"
-    fi
-}
-
-
-# func_mktempdir [string]
-# Make a temporary directory that won't clash with other running
-# libtool processes, and avoids race conditions if possible.  If
-# given, STRING is the basename for that directory.
-func_mktempdir ()
-{
-    my_template="${TMPDIR-/tmp}/${1-$progname}"
-
-    if test "$opt_dry_run" = ":"; then
-      # Return a directory name, but don't create it in dry-run mode
-      my_tmpdir="${my_template}-$$"
-    else
-
-      # If mktemp works, use that first and foremost
-      my_tmpdir=`mktemp -d "${my_template}-XXXXXXXX" 2>/dev/null`
-
-      if test ! -d "$my_tmpdir"; then
-        # Failing that, at least try and use $RANDOM to avoid a race
-        my_tmpdir="${my_template}-${RANDOM-0}$$"
-
-        save_mktempdir_umask=`umask`
-        umask 0077
-        $MKDIR "$my_tmpdir"
-        umask $save_mktempdir_umask
-      fi
-
-      # If we're not in dry-run mode, bomb out on failure
-      test -d "$my_tmpdir" || \
-        func_fatal_error "cannot create temporary directory \`$my_tmpdir'"
-    fi
-
-    $ECHO "$my_tmpdir"
-}
-
-
-# func_quote_for_eval arg
-# Aesthetically quote ARG to be evaled later.
-# This function returns two values: FUNC_QUOTE_FOR_EVAL_RESULT
-# is double-quoted, suitable for a subsequent eval, whereas
-# FUNC_QUOTE_FOR_EVAL_UNQUOTED_RESULT has merely all characters
-# which are still active within double quotes backslashified.
-func_quote_for_eval ()
-{
-    case $1 in
-      *[\\\`\"\$]*)
-	func_quote_for_eval_unquoted_result=`$ECHO "$1" | $SED "$sed_quote_subst"` ;;
-      *)
-        func_quote_for_eval_unquoted_result="$1" ;;
-    esac
-
-    case $func_quote_for_eval_unquoted_result in
-      # Double-quote args containing shell metacharacters to delay
-      # word splitting, command substitution and and variable
-      # expansion for a subsequent eval.
-      # Many Bourne shells cannot handle close brackets correctly
-      # in scan sets, so we specify it separately.
-      *[\[\~\#\^\&\*\(\)\{\}\|\;\<\>\?\'\ \	]*|*]*|"")
-        func_quote_for_eval_result="\"$func_quote_for_eval_unquoted_result\""
-        ;;
-      *)
-        func_quote_for_eval_result="$func_quote_for_eval_unquoted_result"
-    esac
-}
-
-
-# func_quote_for_expand arg
-# Aesthetically quote ARG to be evaled later; same as above,
-# but do not quote variable references.
-func_quote_for_expand ()
-{
-    case $1 in
-      *[\\\`\"]*)
-	my_arg=`$ECHO "$1" | $SED \
-	    -e "$double_quote_subst" -e "$sed_double_backslash"` ;;
-      *)
-        my_arg="$1" ;;
-    esac
-
-    case $my_arg in
-      # Double-quote args containing shell metacharacters to delay
-      # word splitting and command substitution for a subsequent eval.
-      # Many Bourne shells cannot handle close brackets correctly
-      # in scan sets, so we specify it separately.
-      *[\[\~\#\^\&\*\(\)\{\}\|\;\<\>\?\'\ \	]*|*]*|"")
-        my_arg="\"$my_arg\""
-        ;;
-    esac
-
-    func_quote_for_expand_result="$my_arg"
-}
-
-
-# func_show_eval cmd [fail_exp]
-# Unless opt_silent is true, then output CMD.  Then, if opt_dryrun is
-# not true, evaluate CMD.  If the evaluation of CMD fails, and FAIL_EXP
-# is given, then evaluate it.
-func_show_eval ()
-{
-    my_cmd="$1"
-    my_fail_exp="${2-:}"
-
-    ${opt_silent-false} || {
-      func_quote_for_expand "$my_cmd"
-      eval "func_echo $func_quote_for_expand_result"
-    }
-
-    if ${opt_dry_run-false}; then :; else
-      eval "$my_cmd"
-      my_status=$?
-      if test "$my_status" -eq 0; then :; else
-	eval "(exit $my_status); $my_fail_exp"
-      fi
-    fi
-}
-
-
-# func_show_eval_locale cmd [fail_exp]
-# Unless opt_silent is true, then output CMD.  Then, if opt_dryrun is
-# not true, evaluate CMD.  If the evaluation of CMD fails, and FAIL_EXP
-# is given, then evaluate it.  Use the saved locale for evaluation.
-func_show_eval_locale ()
-{
-    my_cmd="$1"
-    my_fail_exp="${2-:}"
-
-    ${opt_silent-false} || {
-      func_quote_for_expand "$my_cmd"
-      eval "func_echo $func_quote_for_expand_result"
-    }
-
-    if ${opt_dry_run-false}; then :; else
-      eval "$lt_user_locale
-	    $my_cmd"
-      my_status=$?
-      eval "$lt_safe_locale"
-      if test "$my_status" -eq 0; then :; else
-	eval "(exit $my_status); $my_fail_exp"
-      fi
-    fi
-}
-
-# func_tr_sh
-# Turn $1 into a string suitable for a shell variable name.
-# Result is stored in $func_tr_sh_result.  All characters
-# not in the set a-zA-Z0-9_ are replaced with '_'. Further,
-# if $1 begins with a digit, a '_' is prepended as well.
-func_tr_sh ()
-{
-  case $1 in
-  [0-9]* | *[!a-zA-Z0-9_]*)
-    func_tr_sh_result=`$ECHO "$1" | $SED 's/^\([0-9]\)/_\1/; s/[^a-zA-Z0-9_]/_/g'`
-    ;;
-  * )
-    func_tr_sh_result=$1
-    ;;
-  esac
-}
-
-
-# func_version
-# Echo version message to standard output and exit.
-func_version ()
-{
-    $opt_debug
-
-    $SED -n '/(C)/!b go
-	:more
-	/\./!{
-	  N
-	  s/\n# / /
-	  b more
-	}
-	:go
-	/^# '$PROGRAM' (GNU /,/# warranty; / {
-        s/^# //
-	s/^# *$//
-        s/\((C)\)[ 0-9,-]*\( [1-9][0-9]*\)/\1\2/
-        p
-     }' < "$progpath"
-     exit $?
-}
-
-# func_usage
-# Echo short help message to standard output and exit.
-func_usage ()
-{
-    $opt_debug
-
-    $SED -n '/^# Usage:/,/^#  *.*--help/ {
-        s/^# //
-	s/^# *$//
-	s/\$progname/'$progname'/
-	p
-    }' < "$progpath"
-    echo
-    $ECHO "run \`$progname --help | more' for full usage"
-    exit $?
-}
-
-# func_help [NOEXIT]
-# Echo long help message to standard output and exit,
-# unless 'noexit' is passed as argument.
-func_help ()
-{
-    $opt_debug
-
-    $SED -n '/^# Usage:/,/# Report bugs to/ {
-	:print
-        s/^# //
-	s/^# *$//
-	s*\$progname*'$progname'*
-	s*\$host*'"$host"'*
-	s*\$SHELL*'"$SHELL"'*
-	s*\$LTCC*'"$LTCC"'*
-	s*\$LTCFLAGS*'"$LTCFLAGS"'*
-	s*\$LD*'"$LD"'*
-	s/\$with_gnu_ld/'"$with_gnu_ld"'/
-	s/\$automake_version/'"`(${AUTOMAKE-automake} --version) 2>/dev/null |$SED 1q`"'/
-	s/\$autoconf_version/'"`(${AUTOCONF-autoconf} --version) 2>/dev/null |$SED 1q`"'/
-	p
-	d
-     }
-     /^# .* home page:/b print
-     /^# General help using/b print
-     ' < "$progpath"
-    ret=$?
-    if test -z "$1"; then
-      exit $ret
-    fi
-}
-
-# func_missing_arg argname
-# Echo program name prefixed message to standard error and set global
-# exit_cmd.
-func_missing_arg ()
-{
-    $opt_debug
-
-    func_error "missing argument for $1."
-    exit_cmd=exit
-}
-
-
-# func_split_short_opt shortopt
-# Set func_split_short_opt_name and func_split_short_opt_arg shell
-# variables after splitting SHORTOPT after the 2nd character.
-func_split_short_opt ()
-{
-    my_sed_short_opt='1s/^\(..\).*$/\1/;q'
-    my_sed_short_rest='1s/^..\(.*\)$/\1/;q'
-
-    func_split_short_opt_name=`$ECHO "$1" | $SED "$my_sed_short_opt"`
-    func_split_short_opt_arg=`$ECHO "$1" | $SED "$my_sed_short_rest"`
-} # func_split_short_opt may be replaced by extended shell implementation
-
-
-# func_split_long_opt longopt
-# Set func_split_long_opt_name and func_split_long_opt_arg shell
-# variables after splitting LONGOPT at the `=' sign.
-func_split_long_opt ()
-{
-    my_sed_long_opt='1s/^\(--[^=]*\)=.*/\1/;q'
-    my_sed_long_arg='1s/^--[^=]*=//'
-
-    func_split_long_opt_name=`$ECHO "$1" | $SED "$my_sed_long_opt"`
-    func_split_long_opt_arg=`$ECHO "$1" | $SED "$my_sed_long_arg"`
-} # func_split_long_opt may be replaced by extended shell implementation
-
-exit_cmd=:
-
-
-
-
-
-magic="%%%MAGIC variable%%%"
-magic_exe="%%%MAGIC EXE variable%%%"
-
-# Global variables.
-nonopt=
-preserve_args=
-lo2o="s/\\.lo\$/.${objext}/"
-o2lo="s/\\.${objext}\$/.lo/"
-extracted_archives=
-extracted_serial=0
-
-# If this variable is set in any of the actions, the command in it
-# will be execed at the end.  This prevents here-documents from being
-# left over by shells.
-exec_cmd=
-
-# func_append var value
-# Append VALUE to the end of shell variable VAR.
-func_append ()
-{
-    eval "${1}=\$${1}\${2}"
-} # func_append may be replaced by extended shell implementation
-
-# func_append_quoted var value
-# Quote VALUE and append to the end of shell variable VAR, separated
-# by a space.
-func_append_quoted ()
-{
-    func_quote_for_eval "${2}"
-    eval "${1}=\$${1}\\ \$func_quote_for_eval_result"
-} # func_append_quoted may be replaced by extended shell implementation
-
-
-# func_arith arithmetic-term...
-func_arith ()
-{
-    func_arith_result=`expr "${@}"`
-} # func_arith may be replaced by extended shell implementation
-
-
-# func_len string
-# STRING may not start with a hyphen.
-func_len ()
-{
-    func_len_result=`expr "${1}" : ".*" 2>/dev/null || echo $max_cmd_len`
-} # func_len may be replaced by extended shell implementation
-
-
-# func_lo2o object
-func_lo2o ()
-{
-    func_lo2o_result=`$ECHO "${1}" | $SED "$lo2o"`
-} # func_lo2o may be replaced by extended shell implementation
-
-
-# func_xform libobj-or-source
-func_xform ()
-{
-    func_xform_result=`$ECHO "${1}" | $SED 's/\.[^.]*$/.lo/'`
-} # func_xform may be replaced by extended shell implementation
-
-
-# func_fatal_configuration arg...
-# Echo program name prefixed message to standard error, followed by
-# a configuration failure hint, and exit.
-func_fatal_configuration ()
-{
-    func_error ${1+"$@"}
-    func_error "See the $PACKAGE documentation for more information."
-    func_fatal_error "Fatal configuration error."
-}
-
-
-# func_config
-# Display the configuration for all the tags in this script.
-func_config ()
-{
-    re_begincf='^# ### BEGIN LIBTOOL'
-    re_endcf='^# ### END LIBTOOL'
-
-    # Default configuration.
-    $SED "1,/$re_begincf CONFIG/d;/$re_endcf CONFIG/,\$d" < "$progpath"
-
-    # Now print the configurations for the tags.
-    for tagname in $taglist; do
-      $SED -n "/$re_begincf TAG CONFIG: $tagname\$/,/$re_endcf TAG CONFIG: $tagname\$/p" < "$progpath"
-    done
-
-    exit $?
-}
-
-# func_features
-# Display the features supported by this script.
-func_features ()
-{
-    echo "host: $host"
-    if test "$build_libtool_libs" = yes; then
-      echo "enable shared libraries"
-    else
-      echo "disable shared libraries"
-    fi
-    if test "$build_old_libs" = yes; then
-      echo "enable static libraries"
-    else
-      echo "disable static libraries"
-    fi
-
-    exit $?
-}
-
-# func_enable_tag tagname
-# Verify that TAGNAME is valid, and either flag an error and exit, or
-# enable the TAGNAME tag.  We also add TAGNAME to the global $taglist
-# variable here.
-func_enable_tag ()
-{
-  # Global variable:
-  tagname="$1"
-
-  re_begincf="^# ### BEGIN LIBTOOL TAG CONFIG: $tagname\$"
-  re_endcf="^# ### END LIBTOOL TAG CONFIG: $tagname\$"
-  sed_extractcf="/$re_begincf/,/$re_endcf/p"
-
-  # Validate tagname.
-  case $tagname in
-    *[!-_A-Za-z0-9,/]*)
-      func_fatal_error "invalid tag name: $tagname"
-      ;;
-  esac
-
-  # Don't test for the "default" C tag, as we know it's
-  # there but not specially marked.
-  case $tagname in
-    CC) ;;
-    *)
-      if $GREP "$re_begincf" "$progpath" >/dev/null 2>&1; then
-	taglist="$taglist $tagname"
-
-	# Evaluate the configuration.  Be careful to quote the path
-	# and the sed script, to avoid splitting on whitespace, but
-	# also don't use non-portable quotes within backquotes within
-	# quotes we have to do it in 2 steps:
-	extractedcf=`$SED -n -e "$sed_extractcf" < "$progpath"`
-	eval "$extractedcf"
-      else
-	func_error "ignoring unknown tag $tagname"
-      fi
-      ;;
-  esac
-}
-
-# func_check_version_match
-# Ensure that we are using m4 macros, and libtool script from the same
-# release of libtool.
-func_check_version_match ()
-{
-  if test "$package_revision" != "$macro_revision"; then
-    if test "$VERSION" != "$macro_version"; then
-      if test -z "$macro_version"; then
-        cat >&2 <<_LT_EOF
-$progname: Version mismatch error.  This is $PACKAGE $VERSION, but the
-$progname: definition of this LT_INIT comes from an older release.
-$progname: You should recreate aclocal.m4 with macros from $PACKAGE $VERSION
-$progname: and run autoconf again.
-_LT_EOF
-      else
-        cat >&2 <<_LT_EOF
-$progname: Version mismatch error.  This is $PACKAGE $VERSION, but the
-$progname: definition of this LT_INIT comes from $PACKAGE $macro_version.
-$progname: You should recreate aclocal.m4 with macros from $PACKAGE $VERSION
-$progname: and run autoconf again.
-_LT_EOF
-      fi
-    else
-      cat >&2 <<_LT_EOF
-$progname: Version mismatch error.  This is $PACKAGE $VERSION, revision $package_revision,
-$progname: but the definition of this LT_INIT comes from revision $macro_revision.
-$progname: You should recreate aclocal.m4 with macros from revision $package_revision
-$progname: of $PACKAGE $VERSION and run autoconf again.
-_LT_EOF
-    fi
-
-    exit $EXIT_MISMATCH
-  fi
-}
-
-
-# Shorthand for --mode=foo, only valid as the first argument
-case $1 in
-clean|clea|cle|cl)
-  shift; set dummy --mode clean ${1+"$@"}; shift
-  ;;
-compile|compil|compi|comp|com|co|c)
-  shift; set dummy --mode compile ${1+"$@"}; shift
-  ;;
-execute|execut|execu|exec|exe|ex|e)
-  shift; set dummy --mode execute ${1+"$@"}; shift
-  ;;
-finish|finis|fini|fin|fi|f)
-  shift; set dummy --mode finish ${1+"$@"}; shift
-  ;;
-install|instal|insta|inst|ins|in|i)
-  shift; set dummy --mode install ${1+"$@"}; shift
-  ;;
-link|lin|li|l)
-  shift; set dummy --mode link ${1+"$@"}; shift
-  ;;
-uninstall|uninstal|uninsta|uninst|unins|unin|uni|un|u)
-  shift; set dummy --mode uninstall ${1+"$@"}; shift
-  ;;
-esac
-
-
-
-# Option defaults:
-opt_debug=:
-opt_dry_run=false
-opt_config=false
-opt_preserve_dup_deps=false
-opt_features=false
-opt_finish=false
-opt_help=false
-opt_help_all=false
-opt_silent=:
-opt_warning=:
-opt_verbose=:
-opt_silent=false
-opt_verbose=false
-
-
-# Parse options once, thoroughly.  This comes as soon as possible in the
-# script to make things like `--version' happen as quickly as we can.
-{
-  # this just eases exit handling
-  while test $# -gt 0; do
-    opt="$1"
-    shift
-    case $opt in
-      --debug|-x)	opt_debug='set -x'
-			func_echo "enabling shell trace mode"
-			$opt_debug
-			;;
-      --dry-run|--dryrun|-n)
-			opt_dry_run=:
-			;;
-      --config)
-			opt_config=:
-func_config
-			;;
-      --dlopen|-dlopen)
-			optarg="$1"
-			opt_dlopen="${opt_dlopen+$opt_dlopen
-}$optarg"
-			shift
-			;;
-      --preserve-dup-deps)
-			opt_preserve_dup_deps=:
-			;;
-      --features)
-			opt_features=:
-func_features
-			;;
-      --finish)
-			opt_finish=:
-set dummy --mode finish ${1+"$@"}; shift
-			;;
-      --help)
-			opt_help=:
-			;;
-      --help-all)
-			opt_help_all=:
-opt_help=': help-all'
-			;;
-      --mode)
-			test $# = 0 && func_missing_arg $opt && break
-			optarg="$1"
-			opt_mode="$optarg"
-case $optarg in
-  # Valid mode arguments:
-  clean|compile|execute|finish|install|link|relink|uninstall) ;;
-
-  # Catch anything else as an error
-  *) func_error "invalid argument for $opt"
-     exit_cmd=exit
-     break
-     ;;
-esac
-			shift
-			;;
-      --no-silent|--no-quiet)
-			opt_silent=false
-func_append preserve_args " $opt"
-			;;
-      --no-warning|--no-warn)
-			opt_warning=false
-func_append preserve_args " $opt"
-			;;
-      --no-verbose)
-			opt_verbose=false
-func_append preserve_args " $opt"
-			;;
-      --silent|--quiet)
-			opt_silent=:
-func_append preserve_args " $opt"
-        opt_verbose=false
-			;;
-      --verbose|-v)
-			opt_verbose=:
-func_append preserve_args " $opt"
-opt_silent=false
-			;;
-      --tag)
-			test $# = 0 && func_missing_arg $opt && break
-			optarg="$1"
-			opt_tag="$optarg"
-func_append preserve_args " $opt $optarg"
-func_enable_tag "$optarg"
-			shift
-			;;
-
-      -\?|-h)		func_usage				;;
-      --help)		func_help				;;
-      --version)	func_version				;;
-
-      # Separate optargs to long options:
-      --*=*)
-			func_split_long_opt "$opt"
-			set dummy "$func_split_long_opt_name" "$func_split_long_opt_arg" ${1+"$@"}
-			shift
-			;;
-
-      # Separate non-argument short options:
-      -\?*|-h*|-n*|-v*)
-			func_split_short_opt "$opt"
-			set dummy "$func_split_short_opt_name" "-$func_split_short_opt_arg" ${1+"$@"}
-			shift
-			;;
-
-      --)		break					;;
-      -*)		func_fatal_help "unrecognized option \`$opt'" ;;
-      *)		set dummy "$opt" ${1+"$@"};	shift; break  ;;
-    esac
-  done
-
-  # Validate options:
-
-  # save first non-option argument
-  if test "$#" -gt 0; then
-    nonopt="$opt"
-    shift
-  fi
-
-  # preserve --debug
-  test "$opt_debug" = : || func_append preserve_args " --debug"
-
-  case $host in
-    *cygwin* | *mingw* | *pw32* | *cegcc*)
-      # don't eliminate duplications in $postdeps and $predeps
-      opt_duplicate_compiler_generated_deps=:
-      ;;
-    *)
-      opt_duplicate_compiler_generated_deps=$opt_preserve_dup_deps
-      ;;
-  esac
-
-  $opt_help || {
-    # Sanity checks first:
-    func_check_version_match
-
-    if test "$build_libtool_libs" != yes && test "$build_old_libs" != yes; then
-      func_fatal_configuration "not configured to build any kind of library"
-    fi
-
-    # Darwin sucks
-    eval std_shrext=\"$shrext_cmds\"
-
-    # Only execute mode is allowed to have -dlopen flags.
-    if test -n "$opt_dlopen" && test "$opt_mode" != execute; then
-      func_error "unrecognized option \`-dlopen'"
-      $ECHO "$help" 1>&2
-      exit $EXIT_FAILURE
-    fi
-
-    # Change the help message to a mode-specific one.
-    generic_help="$help"
-    help="Try \`$progname --help --mode=$opt_mode' for more information."
-  }
-
-
-  # Bail if the options were screwed
-  $exit_cmd $EXIT_FAILURE
-}
-
-
-
-
-## ----------- ##
-##    Main.    ##
-## ----------- ##
-
-# func_lalib_p file
-# True iff FILE is a libtool `.la' library or `.lo' object file.
-# This function is only a basic sanity check; it will hardly flush out
-# determined imposters.
-func_lalib_p ()
-{
-    test -f "$1" &&
-      $SED -e 4q "$1" 2>/dev/null \
-        | $GREP "^# Generated by .*$PACKAGE" > /dev/null 2>&1
-}
-
-# func_lalib_unsafe_p file
-# True iff FILE is a libtool `.la' library or `.lo' object file.
-# This function implements the same check as func_lalib_p without
-# resorting to external programs.  To this end, it redirects stdin and
-# closes it afterwards, without saving the original file descriptor.
-# As a safety measure, use it only where a negative result would be
-# fatal anyway.  Works if `file' does not exist.
-func_lalib_unsafe_p ()
-{
-    lalib_p=no
-    if test -f "$1" && test -r "$1" && exec 5<&0 <"$1"; then
-	for lalib_p_l in 1 2 3 4
-	do
-	    read lalib_p_line
-	    case "$lalib_p_line" in
-		\#\ Generated\ by\ *$PACKAGE* ) lalib_p=yes; break;;
-	    esac
-	done
-	exec 0<&5 5<&-
-    fi
-    test "$lalib_p" = yes
-}
-
-# func_ltwrapper_script_p file
-# True iff FILE is a libtool wrapper script
-# This function is only a basic sanity check; it will hardly flush out
-# determined imposters.
-func_ltwrapper_script_p ()
-{
-    func_lalib_p "$1"
-}
-
-# func_ltwrapper_executable_p file
-# True iff FILE is a libtool wrapper executable
-# This function is only a basic sanity check; it will hardly flush out
-# determined imposters.
-func_ltwrapper_executable_p ()
-{
-    func_ltwrapper_exec_suffix=
-    case $1 in
-    *.exe) ;;
-    *) func_ltwrapper_exec_suffix=.exe ;;
-    esac
-    $GREP "$magic_exe" "$1$func_ltwrapper_exec_suffix" >/dev/null 2>&1
-}
-
-# func_ltwrapper_scriptname file
-# Assumes file is an ltwrapper_executable
-# uses $file to determine the appropriate filename for a
-# temporary ltwrapper_script.
-func_ltwrapper_scriptname ()
-{
-    func_dirname_and_basename "$1" "" "."
-    func_stripname '' '.exe' "$func_basename_result"
-    func_ltwrapper_scriptname_result="$func_dirname_result/$objdir/${func_stripname_result}_ltshwrapper"
-}
-
-# func_ltwrapper_p file
-# True iff FILE is a libtool wrapper script or wrapper executable
-# This function is only a basic sanity check; it will hardly flush out
-# determined imposters.
-func_ltwrapper_p ()
-{
-    func_ltwrapper_script_p "$1" || func_ltwrapper_executable_p "$1"
-}
-
-
-# func_execute_cmds commands fail_cmd
-# Execute tilde-delimited COMMANDS.
-# If FAIL_CMD is given, eval that upon failure.
-# FAIL_CMD may read-access the current command in variable CMD!
-func_execute_cmds ()
-{
-    $opt_debug
-    save_ifs=$IFS; IFS='~'
-    for cmd in $1; do
-      IFS=$save_ifs
-      eval cmd=\"$cmd\"
-      func_show_eval "$cmd" "${2-:}"
-    done
-    IFS=$save_ifs
-}
-
-
-# func_source file
-# Source FILE, adding directory component if necessary.
-# Note that it is not necessary on cygwin/mingw to append a dot to
-# FILE even if both FILE and FILE.exe exist: automatic-append-.exe
-# behavior happens only for exec(3), not for open(2)!  Also, sourcing
-# `FILE.' does not work on cygwin managed mounts.
-func_source ()
-{
-    $opt_debug
-    case $1 in
-    */* | *\\*)	. "$1" ;;
-    *)		. "./$1" ;;
-    esac
-}
-
-
-# func_resolve_sysroot PATH
-# Replace a leading = in PATH with a sysroot.  Store the result into
-# func_resolve_sysroot_result
-func_resolve_sysroot ()
-{
-  func_resolve_sysroot_result=$1
-  case $func_resolve_sysroot_result in
-  =*)
-    func_stripname '=' '' "$func_resolve_sysroot_result"
-    func_resolve_sysroot_result=$lt_sysroot$func_stripname_result
-    ;;
-  esac
-}
-
-# func_replace_sysroot PATH
-# If PATH begins with the sysroot, replace it with = and
-# store the result into func_replace_sysroot_result.
-func_replace_sysroot ()
-{
-  case "$lt_sysroot:$1" in
-  ?*:"$lt_sysroot"*)
-    func_stripname "$lt_sysroot" '' "$1"
-    func_replace_sysroot_result="=$func_stripname_result"
-    ;;
-  *)
-    # Including no sysroot.
-    func_replace_sysroot_result=$1
-    ;;
-  esac
-}
-
-# func_infer_tag arg
-# Infer tagged configuration to use if any are available and
-# if one wasn't chosen via the "--tag" command line option.
-# Only attempt this if the compiler in the base compile
-# command doesn't match the default compiler.
-# arg is usually of the form 'gcc ...'
-func_infer_tag ()
-{
-    $opt_debug
-    if test -n "$available_tags" && test -z "$tagname"; then
-      CC_quoted=
-      for arg in $CC; do
-	func_append_quoted CC_quoted "$arg"
-      done
-      CC_expanded=`func_echo_all $CC`
-      CC_quoted_expanded=`func_echo_all $CC_quoted`
-      case $@ in
-      # Blanks in the command may have been stripped by the calling shell,
-      # but not from the CC environment variable when configure was run.
-      " $CC "* | "$CC "* | " $CC_expanded "* | "$CC_expanded "* | \
-      " $CC_quoted"* | "$CC_quoted "* | " $CC_quoted_expanded "* | "$CC_quoted_expanded "*) ;;
-      # Blanks at the start of $base_compile will cause this to fail
-      # if we don't check for them as well.
-      *)
-	for z in $available_tags; do
-	  if $GREP "^# ### BEGIN LIBTOOL TAG CONFIG: $z$" < "$progpath" > /dev/null; then
-	    # Evaluate the configuration.
-	    eval "`${SED} -n -e '/^# ### BEGIN LIBTOOL TAG CONFIG: '$z'$/,/^# ### END LIBTOOL TAG CONFIG: '$z'$/p' < $progpath`"
-	    CC_quoted=
-	    for arg in $CC; do
-	      # Double-quote args containing other shell metacharacters.
-	      func_append_quoted CC_quoted "$arg"
-	    done
-	    CC_expanded=`func_echo_all $CC`
-	    CC_quoted_expanded=`func_echo_all $CC_quoted`
-	    case "$@ " in
-	    " $CC "* | "$CC "* | " $CC_expanded "* | "$CC_expanded "* | \
-	    " $CC_quoted"* | "$CC_quoted "* | " $CC_quoted_expanded "* | "$CC_quoted_expanded "*)
-	      # The compiler in the base compile command matches
-	      # the one in the tagged configuration.
-	      # Assume this is the tagged configuration we want.
-	      tagname=$z
-	      break
-	      ;;
-	    esac
-	  fi
-	done
-	# If $tagname still isn't set, then no tagged configuration
-	# was found and let the user know that the "--tag" command
-	# line option must be used.
-	if test -z "$tagname"; then
-	  func_echo "unable to infer tagged configuration"
-	  func_fatal_error "specify a tag with \`--tag'"
-#	else
-#	  func_verbose "using $tagname tagged configuration"
-	fi
-	;;
-      esac
-    fi
-}
-
-
-
-# func_write_libtool_object output_name pic_name nonpic_name
-# Create a libtool object file (analogous to a ".la" file),
-# but don't create it if we're doing a dry run.
-func_write_libtool_object ()
-{
-    write_libobj=${1}
-    if test "$build_libtool_libs" = yes; then
-      write_lobj=\'${2}\'
-    else
-      write_lobj=none
-    fi
-
-    if test "$build_old_libs" = yes; then
-      write_oldobj=\'${3}\'
-    else
-      write_oldobj=none
-    fi
-
-    $opt_dry_run || {
-      cat >${write_libobj}T <<EOF
-# $write_libobj - a libtool object file
-# Generated by $PROGRAM (GNU $PACKAGE$TIMESTAMP) $VERSION
-#
-# Please DO NOT delete this file!
-# It is necessary for linking the library.
-
-# Name of the PIC object.
-pic_object=$write_lobj
-
-# Name of the non-PIC object
-non_pic_object=$write_oldobj
-
-EOF
-      $MV "${write_libobj}T" "${write_libobj}"
-    }
-}
-
-
-##################################################
-# FILE NAME AND PATH CONVERSION HELPER FUNCTIONS #
-##################################################
-
-# func_convert_core_file_wine_to_w32 ARG
-# Helper function used by file name conversion functions when $build is *nix,
-# and $host is mingw, cygwin, or some other w32 environment. Relies on a
-# correctly configured wine environment available, with the winepath program
-# in $build's $PATH.
-#
-# ARG is the $build file name to be converted to w32 format.
-# Result is available in $func_convert_core_file_wine_to_w32_result, and will
-# be empty on error (or when ARG is empty)
-func_convert_core_file_wine_to_w32 ()
-{
-  $opt_debug
-  func_convert_core_file_wine_to_w32_result="$1"
-  if test -n "$1"; then
-    # Unfortunately, winepath does not exit with a non-zero error code, so we
-    # are forced to check the contents of stdout. On the other hand, if the
-    # command is not found, the shell will set an exit code of 127 and print
-    # *an error message* to stdout. So we must check for both error code of
-    # zero AND non-empty stdout, which explains the odd construction:
-    func_convert_core_file_wine_to_w32_tmp=`winepath -w "$1" 2>/dev/null`
-    if test "$?" -eq 0 && test -n "${func_convert_core_file_wine_to_w32_tmp}"; then
-      func_convert_core_file_wine_to_w32_result=`$ECHO "$func_convert_core_file_wine_to_w32_tmp" |
-        $SED -e "$lt_sed_naive_backslashify"`
-    else
-      func_convert_core_file_wine_to_w32_result=
-    fi
-  fi
-}
-# end: func_convert_core_file_wine_to_w32
-
-
-# func_convert_core_path_wine_to_w32 ARG
-# Helper function used by path conversion functions when $build is *nix, and
-# $host is mingw, cygwin, or some other w32 environment. Relies on a correctly
-# configured wine environment available, with the winepath program in $build's
-# $PATH. Assumes ARG has no leading or trailing path separator characters.
-#
-# ARG is path to be converted from $build format to win32.
-# Result is available in $func_convert_core_path_wine_to_w32_result.
-# Unconvertible file (directory) names in ARG are skipped; if no directory names
-# are convertible, then the result may be empty.
-func_convert_core_path_wine_to_w32 ()
-{
-  $opt_debug
-  # unfortunately, winepath doesn't convert paths, only file names
-  func_convert_core_path_wine_to_w32_result=""
-  if test -n "$1"; then
-    oldIFS=$IFS
-    IFS=:
-    for func_convert_core_path_wine_to_w32_f in $1; do
-      IFS=$oldIFS
-      func_convert_core_file_wine_to_w32 "$func_convert_core_path_wine_to_w32_f"
-      if test -n "$func_convert_core_file_wine_to_w32_result" ; then
-        if test -z "$func_convert_core_path_wine_to_w32_result"; then
-          func_convert_core_path_wine_to_w32_result="$func_convert_core_file_wine_to_w32_result"
-        else
-          func_append func_convert_core_path_wine_to_w32_result ";$func_convert_core_file_wine_to_w32_result"
-        fi
-      fi
-    done
-    IFS=$oldIFS
-  fi
-}
-# end: func_convert_core_path_wine_to_w32
-
-
-# func_cygpath ARGS...
-# Wrapper around calling the cygpath program via LT_CYGPATH. This is used when
-# when (1) $build is *nix and Cygwin is hosted via a wine environment; or (2)
-# $build is MSYS and $host is Cygwin, or (3) $build is Cygwin. In case (1) or
-# (2), returns the Cygwin file name or path in func_cygpath_result (input
-# file name or path is assumed to be in w32 format, as previously converted
-# from $build's *nix or MSYS format). In case (3), returns the w32 file name
-# or path in func_cygpath_result (input file name or path is assumed to be in
-# Cygwin format). Returns an empty string on error.
-#
-# ARGS are passed to cygpath, with the last one being the file name or path to
-# be converted.
-#
-# Specify the absolute *nix (or w32) name to cygpath in the LT_CYGPATH
-# environment variable; do not put it in $PATH.
-func_cygpath ()
-{
-  $opt_debug
-  if test -n "$LT_CYGPATH" && test -f "$LT_CYGPATH"; then
-    func_cygpath_result=`$LT_CYGPATH "$@" 2>/dev/null`
-    if test "$?" -ne 0; then
-      # on failure, ensure result is empty
-      func_cygpath_result=
-    fi
-  else
-    func_cygpath_result=
-    func_error "LT_CYGPATH is empty or specifies non-existent file: \`$LT_CYGPATH'"
-  fi
-}
-#end: func_cygpath
-
-
-# func_convert_core_msys_to_w32 ARG
-# Convert file name or path ARG from MSYS format to w32 format.  Return
-# result in func_convert_core_msys_to_w32_result.
-func_convert_core_msys_to_w32 ()
-{
-  $opt_debug
-  # awkward: cmd appends spaces to result
-  func_convert_core_msys_to_w32_result=`( cmd //c echo "$1" ) 2>/dev/null |
-    $SED -e 's/[ ]*$//' -e "$lt_sed_naive_backslashify"`
-}
-#end: func_convert_core_msys_to_w32
-
-
-# func_convert_file_check ARG1 ARG2
-# Verify that ARG1 (a file name in $build format) was converted to $host
-# format in ARG2. Otherwise, emit an error message, but continue (resetting
-# func_to_host_file_result to ARG1).
-func_convert_file_check ()
-{
-  $opt_debug
-  if test -z "$2" && test -n "$1" ; then
-    func_error "Could not determine host file name corresponding to"
-    func_error "  \`$1'"
-    func_error "Continuing, but uninstalled executables may not work."
-    # Fallback:
-    func_to_host_file_result="$1"
-  fi
-}
-# end func_convert_file_check
-
-
-# func_convert_path_check FROM_PATHSEP TO_PATHSEP FROM_PATH TO_PATH
-# Verify that FROM_PATH (a path in $build format) was converted to $host
-# format in TO_PATH. Otherwise, emit an error message, but continue, resetting
-# func_to_host_file_result to a simplistic fallback value (see below).
-func_convert_path_check ()
-{
-  $opt_debug
-  if test -z "$4" && test -n "$3"; then
-    func_error "Could not determine the host path corresponding to"
-    func_error "  \`$3'"
-    func_error "Continuing, but uninstalled executables may not work."
-    # Fallback.  This is a deliberately simplistic "conversion" and
-    # should not be "improved".  See libtool.info.
-    if test "x$1" != "x$2"; then
-      lt_replace_pathsep_chars="s|$1|$2|g"
-      func_to_host_path_result=`echo "$3" |
-        $SED -e "$lt_replace_pathsep_chars"`
-    else
-      func_to_host_path_result="$3"
-    fi
-  fi
-}
-# end func_convert_path_check
-
-
-# func_convert_path_front_back_pathsep FRONTPAT BACKPAT REPL ORIG
-# Modifies func_to_host_path_result by prepending REPL if ORIG matches FRONTPAT
-# and appending REPL if ORIG matches BACKPAT.
-func_convert_path_front_back_pathsep ()
-{
-  $opt_debug
-  case $4 in
-  $1 ) func_to_host_path_result="$3$func_to_host_path_result"
-    ;;
-  esac
-  case $4 in
-  $2 ) func_append func_to_host_path_result "$3"
-    ;;
-  esac
-}
-# end func_convert_path_front_back_pathsep
-
-
-##################################################
-# $build to $host FILE NAME CONVERSION FUNCTIONS #
-##################################################
-# invoked via `$to_host_file_cmd ARG'
-#
-# In each case, ARG is the path to be converted from $build to $host format.
-# Result will be available in $func_to_host_file_result.
-
-
-# func_to_host_file ARG
-# Converts the file name ARG from $build format to $host format. Return result
-# in func_to_host_file_result.
-func_to_host_file ()
-{
-  $opt_debug
-  $to_host_file_cmd "$1"
-}
-# end func_to_host_file
-
-
-# func_to_tool_file ARG LAZY
-# converts the file name ARG from $build format to toolchain format. Return
-# result in func_to_tool_file_result.  If the conversion in use is listed
-# in (the comma separated) LAZY, no conversion takes place.
-func_to_tool_file ()
-{
-  $opt_debug
-  case ,$2, in
-    *,"$to_tool_file_cmd",*)
-      func_to_tool_file_result=$1
-      ;;
-    *)
-      $to_tool_file_cmd "$1"
-      func_to_tool_file_result=$func_to_host_file_result
-      ;;
-  esac
-}
-# end func_to_tool_file
-
-
-# func_convert_file_noop ARG
-# Copy ARG to func_to_host_file_result.
-func_convert_file_noop ()
-{
-  func_to_host_file_result="$1"
-}
-# end func_convert_file_noop
-
-
-# func_convert_file_msys_to_w32 ARG
-# Convert file name ARG from (mingw) MSYS to (mingw) w32 format; automatic
-# conversion to w32 is not available inside the cwrapper.  Returns result in
-# func_to_host_file_result.
-func_convert_file_msys_to_w32 ()
-{
-  $opt_debug
-  func_to_host_file_result="$1"
-  if test -n "$1"; then
-    func_convert_core_msys_to_w32 "$1"
-    func_to_host_file_result="$func_convert_core_msys_to_w32_result"
-  fi
-  func_convert_file_check "$1" "$func_to_host_file_result"
-}
-# end func_convert_file_msys_to_w32
-
-
-# func_convert_file_cygwin_to_w32 ARG
-# Convert file name ARG from Cygwin to w32 format.  Returns result in
-# func_to_host_file_result.
-func_convert_file_cygwin_to_w32 ()
-{
-  $opt_debug
-  func_to_host_file_result="$1"
-  if test -n "$1"; then
-    # because $build is cygwin, we call "the" cygpath in $PATH; no need to use
-    # LT_CYGPATH in this case.
-    func_to_host_file_result=`cygpath -m "$1"`
-  fi
-  func_convert_file_check "$1" "$func_to_host_file_result"
-}
-# end func_convert_file_cygwin_to_w32
-
-
-# func_convert_file_nix_to_w32 ARG
-# Convert file name ARG from *nix to w32 format.  Requires a wine environment
-# and a working winepath. Returns result in func_to_host_file_result.
-func_convert_file_nix_to_w32 ()
-{
-  $opt_debug
-  func_to_host_file_result="$1"
-  if test -n "$1"; then
-    func_convert_core_file_wine_to_w32 "$1"
-    func_to_host_file_result="$func_convert_core_file_wine_to_w32_result"
-  fi
-  func_convert_file_check "$1" "$func_to_host_file_result"
-}
-# end func_convert_file_nix_to_w32
-
-
-# func_convert_file_msys_to_cygwin ARG
-# Convert file name ARG from MSYS to Cygwin format.  Requires LT_CYGPATH set.
-# Returns result in func_to_host_file_result.
-func_convert_file_msys_to_cygwin ()
-{
-  $opt_debug
-  func_to_host_file_result="$1"
-  if test -n "$1"; then
-    func_convert_core_msys_to_w32 "$1"
-    func_cygpath -u "$func_convert_core_msys_to_w32_result"
-    func_to_host_file_result="$func_cygpath_result"
-  fi
-  func_convert_file_check "$1" "$func_to_host_file_result"
-}
-# end func_convert_file_msys_to_cygwin
-
-
-# func_convert_file_nix_to_cygwin ARG
-# Convert file name ARG from *nix to Cygwin format.  Requires Cygwin installed
-# in a wine environment, working winepath, and LT_CYGPATH set.  Returns result
-# in func_to_host_file_result.
-func_convert_file_nix_to_cygwin ()
-{
-  $opt_debug
-  func_to_host_file_result="$1"
-  if test -n "$1"; then
-    # convert from *nix to w32, then use cygpath to convert from w32 to cygwin.
-    func_convert_core_file_wine_to_w32 "$1"
-    func_cygpath -u "$func_convert_core_file_wine_to_w32_result"
-    func_to_host_file_result="$func_cygpath_result"
-  fi
-  func_convert_file_check "$1" "$func_to_host_file_result"
-}
-# end func_convert_file_nix_to_cygwin
-
-
-#############################################
-# $build to $host PATH CONVERSION FUNCTIONS #
-#############################################
-# invoked via `$to_host_path_cmd ARG'
-#
-# In each case, ARG is the path to be converted from $build to $host format.
-# The result will be available in $func_to_host_path_result.
-#
-# Path separators are also converted from $build format to $host format.  If
-# ARG begins or ends with a path separator character, it is preserved (but
-# converted to $host format) on output.
-#
-# All path conversion functions are named using the following convention:
-#   file name conversion function    : func_convert_file_X_to_Y ()
-#   path conversion function         : func_convert_path_X_to_Y ()
-# where, for any given $build/$host combination the 'X_to_Y' value is the
-# same.  If conversion functions are added for new $build/$host combinations,
-# the two new functions must follow this pattern, or func_init_to_host_path_cmd
-# will break.
-
-
-# func_init_to_host_path_cmd
-# Ensures that function "pointer" variable $to_host_path_cmd is set to the
-# appropriate value, based on the value of $to_host_file_cmd.
-to_host_path_cmd=
-func_init_to_host_path_cmd ()
-{
-  $opt_debug
-  if test -z "$to_host_path_cmd"; then
-    func_stripname 'func_convert_file_' '' "$to_host_file_cmd"
-    to_host_path_cmd="func_convert_path_${func_stripname_result}"
-  fi
-}
-
-
-# func_to_host_path ARG
-# Converts the path ARG from $build format to $host format. Return result
-# in func_to_host_path_result.
-func_to_host_path ()
-{
-  $opt_debug
-  func_init_to_host_path_cmd
-  $to_host_path_cmd "$1"
-}
-# end func_to_host_path
-
-
-# func_convert_path_noop ARG
-# Copy ARG to func_to_host_path_result.
-func_convert_path_noop ()
-{
-  func_to_host_path_result="$1"
-}
-# end func_convert_path_noop
-
-
-# func_convert_path_msys_to_w32 ARG
-# Convert path ARG from (mingw) MSYS to (mingw) w32 format; automatic
-# conversion to w32 is not available inside the cwrapper.  Returns result in
-# func_to_host_path_result.
-func_convert_path_msys_to_w32 ()
-{
-  $opt_debug
-  func_to_host_path_result="$1"
-  if test -n "$1"; then
-    # Remove leading and trailing path separator characters from ARG.  MSYS
-    # behavior is inconsistent here; cygpath turns them into '.;' and ';.';
-    # and winepath ignores them completely.
-    func_stripname : : "$1"
-    func_to_host_path_tmp1=$func_stripname_result
-    func_convert_core_msys_to_w32 "$func_to_host_path_tmp1"
-    func_to_host_path_result="$func_convert_core_msys_to_w32_result"
-    func_convert_path_check : ";" \
-      "$func_to_host_path_tmp1" "$func_to_host_path_result"
-    func_convert_path_front_back_pathsep ":*" "*:" ";" "$1"
-  fi
-}
-# end func_convert_path_msys_to_w32
-
-
-# func_convert_path_cygwin_to_w32 ARG
-# Convert path ARG from Cygwin to w32 format.  Returns result in
-# func_to_host_file_result.
-func_convert_path_cygwin_to_w32 ()
-{
-  $opt_debug
-  func_to_host_path_result="$1"
-  if test -n "$1"; then
-    # See func_convert_path_msys_to_w32:
-    func_stripname : : "$1"
-    func_to_host_path_tmp1=$func_stripname_result
-    func_to_host_path_result=`cygpath -m -p "$func_to_host_path_tmp1"`
-    func_convert_path_check : ";" \
-      "$func_to_host_path_tmp1" "$func_to_host_path_result"
-    func_convert_path_front_back_pathsep ":*" "*:" ";" "$1"
-  fi
-}
-# end func_convert_path_cygwin_to_w32
-
-
-# func_convert_path_nix_to_w32 ARG
-# Convert path ARG from *nix to w32 format.  Requires a wine environment and
-# a working winepath.  Returns result in func_to_host_file_result.
-func_convert_path_nix_to_w32 ()
-{
-  $opt_debug
-  func_to_host_path_result="$1"
-  if test -n "$1"; then
-    # See func_convert_path_msys_to_w32:
-    func_stripname : : "$1"
-    func_to_host_path_tmp1=$func_stripname_result
-    func_convert_core_path_wine_to_w32 "$func_to_host_path_tmp1"
-    func_to_host_path_result="$func_convert_core_path_wine_to_w32_result"
-    func_convert_path_check : ";" \
-      "$func_to_host_path_tmp1" "$func_to_host_path_result"
-    func_convert_path_front_back_pathsep ":*" "*:" ";" "$1"
-  fi
-}
-# end func_convert_path_nix_to_w32
-
-
-# func_convert_path_msys_to_cygwin ARG
-# Convert path ARG from MSYS to Cygwin format.  Requires LT_CYGPATH set.
-# Returns result in func_to_host_file_result.
-func_convert_path_msys_to_cygwin ()
-{
-  $opt_debug
-  func_to_host_path_result="$1"
-  if test -n "$1"; then
-    # See func_convert_path_msys_to_w32:
-    func_stripname : : "$1"
-    func_to_host_path_tmp1=$func_stripname_result
-    func_convert_core_msys_to_w32 "$func_to_host_path_tmp1"
-    func_cygpath -u -p "$func_convert_core_msys_to_w32_result"
-    func_to_host_path_result="$func_cygpath_result"
-    func_convert_path_check : : \
-      "$func_to_host_path_tmp1" "$func_to_host_path_result"
-    func_convert_path_front_back_pathsep ":*" "*:" : "$1"
-  fi
-}
-# end func_convert_path_msys_to_cygwin
-
-
-# func_convert_path_nix_to_cygwin ARG
-# Convert path ARG from *nix to Cygwin format.  Requires Cygwin installed in a
-# a wine environment, working winepath, and LT_CYGPATH set.  Returns result in
-# func_to_host_file_result.
-func_convert_path_nix_to_cygwin ()
-{
-  $opt_debug
-  func_to_host_path_result="$1"
-  if test -n "$1"; then
-    # Remove leading and trailing path separator characters from
-    # ARG. msys behavior is inconsistent here, cygpath turns them
-    # into '.;' and ';.', and winepath ignores them completely.
-    func_stripname : : "$1"
-    func_to_host_path_tmp1=$func_stripname_result
-    func_convert_core_path_wine_to_w32 "$func_to_host_path_tmp1"
-    func_cygpath -u -p "$func_convert_core_path_wine_to_w32_result"
-    func_to_host_path_result="$func_cygpath_result"
-    func_convert_path_check : : \
-      "$func_to_host_path_tmp1" "$func_to_host_path_result"
-    func_convert_path_front_back_pathsep ":*" "*:" : "$1"
-  fi
-}
-# end func_convert_path_nix_to_cygwin
-
-
-# func_mode_compile arg...
-func_mode_compile ()
-{
-    $opt_debug
-    # Get the compilation command and the source file.
-    base_compile=
-    srcfile="$nonopt"  #  always keep a non-empty value in "srcfile"
-    suppress_opt=yes
-    suppress_output=
-    arg_mode=normal
-    libobj=
-    later=
-    pie_flag=
-
-    for arg
-    do
-      case $arg_mode in
-      arg  )
-	# do not "continue".  Instead, add this to base_compile
-	lastarg="$arg"
-	arg_mode=normal
-	;;
-
-      target )
-	libobj="$arg"
-	arg_mode=normal
-	continue
-	;;
-
-      normal )
-	# Accept any command-line options.
-	case $arg in
-	-o)
-	  test -n "$libobj" && \
-	    func_fatal_error "you cannot specify \`-o' more than once"
-	  arg_mode=target
-	  continue
-	  ;;
-
-	-pie | -fpie | -fPIE)
-          func_append pie_flag " $arg"
-	  continue
-	  ;;
-
-	-shared | -static | -prefer-pic | -prefer-non-pic)
-	  func_append later " $arg"
-	  continue
-	  ;;
-
-	-no-suppress)
-	  suppress_opt=no
-	  continue
-	  ;;
-
-	-Xcompiler)
-	  arg_mode=arg  #  the next one goes into the "base_compile" arg list
-	  continue      #  The current "srcfile" will either be retained or
-	  ;;            #  replaced later.  I would guess that would be a bug.
-
-	-Wc,*)
-	  func_stripname '-Wc,' '' "$arg"
-	  args=$func_stripname_result
-	  lastarg=
-	  save_ifs="$IFS"; IFS=','
-	  for arg in $args; do
-	    IFS="$save_ifs"
-	    func_append_quoted lastarg "$arg"
-	  done
-	  IFS="$save_ifs"
-	  func_stripname ' ' '' "$lastarg"
-	  lastarg=$func_stripname_result
-
-	  # Add the arguments to base_compile.
-	  func_append base_compile " $lastarg"
-	  continue
-	  ;;
-
-	*)
-	  # Accept the current argument as the source file.
-	  # The previous "srcfile" becomes the current argument.
-	  #
-	  lastarg="$srcfile"
-	  srcfile="$arg"
-	  ;;
-	esac  #  case $arg
-	;;
-      esac    #  case $arg_mode
-
-      # Aesthetically quote the previous argument.
-      func_append_quoted base_compile "$lastarg"
-    done # for arg
-
-    case $arg_mode in
-    arg)
-      func_fatal_error "you must specify an argument for -Xcompile"
-      ;;
-    target)
-      func_fatal_error "you must specify a target with \`-o'"
-      ;;
-    *)
-      # Get the name of the library object.
-      test -z "$libobj" && {
-	func_basename "$srcfile"
-	libobj="$func_basename_result"
-      }
-      ;;
-    esac
-
-    # Recognize several different file suffixes.
-    # If the user specifies -o file.o, it is replaced with file.lo
-    case $libobj in
-    *.[cCFSifmso] | \
-    *.ada | *.adb | *.ads | *.asm | \
-    *.c++ | *.cc | *.ii | *.class | *.cpp | *.cxx | \
-    *.[fF][09]? | *.for | *.java | *.go | *.obj | *.sx | *.cu | *.cup)
-      func_xform "$libobj"
-      libobj=$func_xform_result
-      ;;
-    esac
-
-    case $libobj in
-    *.lo) func_lo2o "$libobj"; obj=$func_lo2o_result ;;
-    *)
-      func_fatal_error "cannot determine name of library object from \`$libobj'"
-      ;;
-    esac
-
-    func_infer_tag $base_compile
-
-    for arg in $later; do
-      case $arg in
-      -shared)
-	test "$build_libtool_libs" != yes && \
-	  func_fatal_configuration "can not build a shared library"
-	build_old_libs=no
-	continue
-	;;
-
-      -static)
-	build_libtool_libs=no
-	build_old_libs=yes
-	continue
-	;;
-
-      -prefer-pic)
-	pic_mode=yes
-	continue
-	;;
-
-      -prefer-non-pic)
-	pic_mode=no
-	continue
-	;;
-      esac
-    done
-
-    func_quote_for_eval "$libobj"
-    test "X$libobj" != "X$func_quote_for_eval_result" \
-      && $ECHO "X$libobj" | $GREP '[]~#^*{};<>?"'"'"'	 &()|`$[]' \
-      && func_warning "libobj name \`$libobj' may not contain shell special characters."
-    func_dirname_and_basename "$obj" "/" ""
-    objname="$func_basename_result"
-    xdir="$func_dirname_result"
-    lobj=${xdir}$objdir/$objname
-
-    test -z "$base_compile" && \
-      func_fatal_help "you must specify a compilation command"
-
-    # Delete any leftover library objects.
-    if test "$build_old_libs" = yes; then
-      removelist="$obj $lobj $libobj ${libobj}T"
-    else
-      removelist="$lobj $libobj ${libobj}T"
-    fi
-
-    # On Cygwin there's no "real" PIC flag so we must build both object types
-    case $host_os in
-    cygwin* | mingw* | pw32* | os2* | cegcc*)
-      pic_mode=default
-      ;;
-    esac
-    if test "$pic_mode" = no && test "$deplibs_check_method" != pass_all; then
-      # non-PIC code in shared libraries is not supported
-      pic_mode=default
-    fi
-
-    # Calculate the filename of the output object if compiler does
-    # not support -o with -c
-    if test "$compiler_c_o" = no; then
-      output_obj=`$ECHO "$srcfile" | $SED 's%^.*/%%; s%\.[^.]*$%%'`.${objext}
-      lockfile="$output_obj.lock"
-    else
-      output_obj=
-      need_locks=no
-      lockfile=
-    fi
-
-    # Lock this critical section if it is needed
-    # We use this script file to make the link, it avoids creating a new file
-    if test "$need_locks" = yes; then
-      until $opt_dry_run || ln "$progpath" "$lockfile" 2>/dev/null; do
-	func_echo "Waiting for $lockfile to be removed"
-	sleep 2
-      done
-    elif test "$need_locks" = warn; then
-      if test -f "$lockfile"; then
-	$ECHO "\
-*** ERROR, $lockfile exists and contains:
-`cat $lockfile 2>/dev/null`
-
-This indicates that another process is trying to use the same
-temporary object file, and libtool could not work around it because
-your compiler does not support \`-c' and \`-o' together.  If you
-repeat this compilation, it may succeed, by chance, but you had better
-avoid parallel builds (make -j) in this platform, or get a better
-compiler."
-
-	$opt_dry_run || $RM $removelist
-	exit $EXIT_FAILURE
-      fi
-      func_append removelist " $output_obj"
-      $ECHO "$srcfile" > "$lockfile"
-    fi
-
-    $opt_dry_run || $RM $removelist
-    func_append removelist " $lockfile"
-    trap '$opt_dry_run || $RM $removelist; exit $EXIT_FAILURE' 1 2 15
-
-    func_to_tool_file "$srcfile" func_convert_file_msys_to_w32
-    srcfile=$func_to_tool_file_result
-    func_quote_for_eval "$srcfile"
-    qsrcfile=$func_quote_for_eval_result
-
-    # Only build a PIC object if we are building libtool libraries.
-    if test "$build_libtool_libs" = yes; then
-      # Without this assignment, base_compile gets emptied.
-      fbsd_hideous_sh_bug=$base_compile
-
-      if test "$pic_mode" != no; then
-	command="$base_compile $qsrcfile $pic_flag"
-      else
-	# Don't build PIC code
-	command="$base_compile $qsrcfile"
-      fi
-
-      func_mkdir_p "$xdir$objdir"
-
-      if test -z "$output_obj"; then
-	# Place PIC objects in $objdir
-	func_append command " -o $lobj"
-      fi
-
-      func_show_eval_locale "$command"	\
-          'test -n "$output_obj" && $RM $removelist; exit $EXIT_FAILURE'
-
-      if test "$need_locks" = warn &&
-	 test "X`cat $lockfile 2>/dev/null`" != "X$srcfile"; then
-	$ECHO "\
-*** ERROR, $lockfile contains:
-`cat $lockfile 2>/dev/null`
-
-but it should contain:
-$srcfile
-
-This indicates that another process is trying to use the same
-temporary object file, and libtool could not work around it because
-your compiler does not support \`-c' and \`-o' together.  If you
-repeat this compilation, it may succeed, by chance, but you had better
-avoid parallel builds (make -j) in this platform, or get a better
-compiler."
-
-	$opt_dry_run || $RM $removelist
-	exit $EXIT_FAILURE
-      fi
-
-      # Just move the object if needed, then go on to compile the next one
-      if test -n "$output_obj" && test "X$output_obj" != "X$lobj"; then
-	func_show_eval '$MV "$output_obj" "$lobj"' \
-	  'error=$?; $opt_dry_run || $RM $removelist; exit $error'
-      fi
-
-      # Allow error messages only from the first compilation.
-      if test "$suppress_opt" = yes; then
-	suppress_output=' >/dev/null 2>&1'
-      fi
-    fi
-
-    # Only build a position-dependent object if we build old libraries.
-    if test "$build_old_libs" = yes; then
-      if test "$pic_mode" != yes; then
-	# Don't build PIC code
-	command="$base_compile $qsrcfile$pie_flag"
-      else
-	command="$base_compile $qsrcfile $pic_flag"
-      fi
-      if test "$compiler_c_o" = yes; then
-	func_append command " -o $obj"
-      fi
-
-      # Suppress compiler output if we already did a PIC compilation.
-      func_append command "$suppress_output"
-      func_show_eval_locale "$command" \
-        '$opt_dry_run || $RM $removelist; exit $EXIT_FAILURE'
-
-      if test "$need_locks" = warn &&
-	 test "X`cat $lockfile 2>/dev/null`" != "X$srcfile"; then
-	$ECHO "\
-*** ERROR, $lockfile contains:
-`cat $lockfile 2>/dev/null`
-
-but it should contain:
-$srcfile
-
-This indicates that another process is trying to use the same
-temporary object file, and libtool could not work around it because
-your compiler does not support \`-c' and \`-o' together.  If you
-repeat this compilation, it may succeed, by chance, but you had better
-avoid parallel builds (make -j) in this platform, or get a better
-compiler."
-
-	$opt_dry_run || $RM $removelist
-	exit $EXIT_FAILURE
-      fi
-
-      # Just move the object if needed
-      if test -n "$output_obj" && test "X$output_obj" != "X$obj"; then
-	func_show_eval '$MV "$output_obj" "$obj"' \
-	  'error=$?; $opt_dry_run || $RM $removelist; exit $error'
-      fi
-    fi
-
-    $opt_dry_run || {
-      func_write_libtool_object "$libobj" "$objdir/$objname" "$objname"
-
-      # Unlock the critical section if it was locked
-      if test "$need_locks" != no; then
-	removelist=$lockfile
-        $RM "$lockfile"
-      fi
-    }
-
-    exit $EXIT_SUCCESS
-}
-
-$opt_help || {
-  test "$opt_mode" = compile && func_mode_compile ${1+"$@"}
-}
-
-func_mode_help ()
-{
-    # We need to display help for each of the modes.
-    case $opt_mode in
-      "")
-        # Generic help is extracted from the usage comments
-        # at the start of this file.
-        func_help
-        ;;
-
-      clean)
-        $ECHO \
-"Usage: $progname [OPTION]... --mode=clean RM [RM-OPTION]... FILE...
-
-Remove files from the build directory.
-
-RM is the name of the program to use to delete files associated with each FILE
-(typically \`/bin/rm').  RM-OPTIONS are options (such as \`-f') to be passed
-to RM.
-
-If FILE is a libtool library, object or program, all the files associated
-with it are deleted. Otherwise, only FILE itself is deleted using RM."
-        ;;
-
-      compile)
-      $ECHO \
-"Usage: $progname [OPTION]... --mode=compile COMPILE-COMMAND... SOURCEFILE
-
-Compile a source file into a libtool library object.
-
-This mode accepts the following additional options:
-
-  -o OUTPUT-FILE    set the output file name to OUTPUT-FILE
-  -no-suppress      do not suppress compiler output for multiple passes
-  -prefer-pic       try to build PIC objects only
-  -prefer-non-pic   try to build non-PIC objects only
-  -shared           do not build a \`.o' file suitable for static linking
-  -static           only build a \`.o' file suitable for static linking
-  -Wc,FLAG          pass FLAG directly to the compiler
-
-COMPILE-COMMAND is a command to be used in creating a \`standard' object file
-from the given SOURCEFILE.
-
-The output file name is determined by removing the directory component from
-SOURCEFILE, then substituting the C source code suffix \`.c' with the
-library object suffix, \`.lo'."
-        ;;
-
-      execute)
-        $ECHO \
-"Usage: $progname [OPTION]... --mode=execute COMMAND [ARGS]...
-
-Automatically set library path, then run a program.
-
-This mode accepts the following additional options:
-
-  -dlopen FILE      add the directory containing FILE to the library path
-
-This mode sets the library path environment variable according to \`-dlopen'
-flags.
-
-If any of the ARGS are libtool executable wrappers, then they are translated
-into their corresponding uninstalled binary, and any of their required library
-directories are added to the library path.
-
-Then, COMMAND is executed, with ARGS as arguments."
-        ;;
-
-      finish)
-        $ECHO \
-"Usage: $progname [OPTION]... --mode=finish [LIBDIR]...
-
-Complete the installation of libtool libraries.
-
-Each LIBDIR is a directory that contains libtool libraries.
-
-The commands that this mode executes may require superuser privileges.  Use
-the \`--dry-run' option if you just want to see what would be executed."
-        ;;
-
-      install)
-        $ECHO \
-"Usage: $progname [OPTION]... --mode=install INSTALL-COMMAND...
-
-Install executables or libraries.
-
-INSTALL-COMMAND is the installation command.  The first component should be
-either the \`install' or \`cp' program.
-
-The following components of INSTALL-COMMAND are treated specially:
-
-  -inst-prefix-dir PREFIX-DIR  Use PREFIX-DIR as a staging area for installation
-
-The rest of the components are interpreted as arguments to that command (only
-BSD-compatible install options are recognized)."
-        ;;
-
-      link)
-        $ECHO \
-"Usage: $progname [OPTION]... --mode=link LINK-COMMAND...
-
-Link object files or libraries together to form another library, or to
-create an executable program.
-
-LINK-COMMAND is a command using the C compiler that you would use to create
-a program from several object files.
-
-The following components of LINK-COMMAND are treated specially:
-
-  -all-static       do not do any dynamic linking at all
-  -avoid-version    do not add a version suffix if possible
-  -bindir BINDIR    specify path to binaries directory (for systems where
-                    libraries must be found in the PATH setting at runtime)
-  -dlopen FILE      \`-dlpreopen' FILE if it cannot be dlopened at runtime
-  -dlpreopen FILE   link in FILE and add its symbols to lt_preloaded_symbols
-  -export-dynamic   allow symbols from OUTPUT-FILE to be resolved with dlsym(3)
-  -export-symbols SYMFILE
-                    try to export only the symbols listed in SYMFILE
-  -export-symbols-regex REGEX
-                    try to export only the symbols matching REGEX
-  -LLIBDIR          search LIBDIR for required installed libraries
-  -lNAME            OUTPUT-FILE requires the installed library libNAME
-  -module           build a library that can dlopened
-  -no-fast-install  disable the fast-install mode
-  -no-install       link a not-installable executable
-  -no-undefined     declare that a library does not refer to external symbols
-  -o OUTPUT-FILE    create OUTPUT-FILE from the specified objects
-  -objectlist FILE  Use a list of object files found in FILE to specify objects
-  -precious-files-regex REGEX
-                    don't remove output files matching REGEX
-  -release RELEASE  specify package release information
-  -rpath LIBDIR     the created library will eventually be installed in LIBDIR
-  -R[ ]LIBDIR       add LIBDIR to the runtime path of programs and libraries
-  -shared           only do dynamic linking of libtool libraries
-  -shrext SUFFIX    override the standard shared library file extension
-  -static           do not do any dynamic linking of uninstalled libtool libraries
-  -static-libtool-libs
-                    do not do any dynamic linking of libtool libraries
-  -version-info CURRENT[:REVISION[:AGE]]
-                    specify library version info [each variable defaults to 0]
-  -weak LIBNAME     declare that the target provides the LIBNAME interface
-  -Wc,FLAG
-  -Xcompiler FLAG   pass linker-specific FLAG directly to the compiler
-  -Wl,FLAG
-  -Xlinker FLAG     pass linker-specific FLAG directly to the linker
-  -XCClinker FLAG   pass link-specific FLAG to the compiler driver (CC)
-
-All other options (arguments beginning with \`-') are ignored.
-
-Every other argument is treated as a filename.  Files ending in \`.la' are
-treated as uninstalled libtool libraries, other files are standard or library
-object files.
-
-If the OUTPUT-FILE ends in \`.la', then a libtool library is created,
-only library objects (\`.lo' files) may be specified, and \`-rpath' is
-required, except when creating a convenience library.
-
-If OUTPUT-FILE ends in \`.a' or \`.lib', then a standard library is created
-using \`ar' and \`ranlib', or on Windows using \`lib'.
-
-If OUTPUT-FILE ends in \`.lo' or \`.${objext}', then a reloadable object file
-is created, otherwise an executable program is created."
-        ;;
-
-      uninstall)
-        $ECHO \
-"Usage: $progname [OPTION]... --mode=uninstall RM [RM-OPTION]... FILE...
-
-Remove libraries from an installation directory.
-
-RM is the name of the program to use to delete files associated with each FILE
-(typically \`/bin/rm').  RM-OPTIONS are options (such as \`-f') to be passed
-to RM.
-
-If FILE is a libtool library, all the files associated with it are deleted.
-Otherwise, only FILE itself is deleted using RM."
-        ;;
-
-      *)
-        func_fatal_help "invalid operation mode \`$opt_mode'"
-        ;;
-    esac
-
-    echo
-    $ECHO "Try \`$progname --help' for more information about other modes."
-}
-
-# Now that we've collected a possible --mode arg, show help if necessary
-if $opt_help; then
-  if test "$opt_help" = :; then
-    func_mode_help
-  else
-    {
-      func_help noexit
-      for opt_mode in compile link execute install finish uninstall clean; do
-	func_mode_help
-      done
-    } | sed -n '1p; 2,$s/^Usage:/  or: /p'
-    {
-      func_help noexit
-      for opt_mode in compile link execute install finish uninstall clean; do
-	echo
-	func_mode_help
-      done
-    } |
-    sed '1d
-      /^When reporting/,/^Report/{
-	H
-	d
-      }
-      $x
-      /information about other modes/d
-      /more detailed .*MODE/d
-      s/^Usage:.*--mode=\([^ ]*\) .*/Description of \1 mode:/'
-  fi
-  exit $?
-fi
-
-
-# func_mode_execute arg...
-func_mode_execute ()
-{
-    $opt_debug
-    # The first argument is the command name.
-    cmd="$nonopt"
-    test -z "$cmd" && \
-      func_fatal_help "you must specify a COMMAND"
-
-    # Handle -dlopen flags immediately.
-    for file in $opt_dlopen; do
-      test -f "$file" \
-	|| func_fatal_help "\`$file' is not a file"
-
-      dir=
-      case $file in
-      *.la)
-	func_resolve_sysroot "$file"
-	file=$func_resolve_sysroot_result
-
-	# Check to see that this really is a libtool archive.
-	func_lalib_unsafe_p "$file" \
-	  || func_fatal_help "\`$lib' is not a valid libtool archive"
-
-	# Read the libtool library.
-	dlname=
-	library_names=
-	func_source "$file"
-
-	# Skip this library if it cannot be dlopened.
-	if test -z "$dlname"; then
-	  # Warn if it was a shared library.
-	  test -n "$library_names" && \
-	    func_warning "\`$file' was not linked with \`-export-dynamic'"
-	  continue
-	fi
-
-	func_dirname "$file" "" "."
-	dir="$func_dirname_result"
-
-	if test -f "$dir/$objdir/$dlname"; then
-	  func_append dir "/$objdir"
-	else
-	  if test ! -f "$dir/$dlname"; then
-	    func_fatal_error "cannot find \`$dlname' in \`$dir' or \`$dir/$objdir'"
-	  fi
-	fi
-	;;
-
-      *.lo)
-	# Just add the directory containing the .lo file.
-	func_dirname "$file" "" "."
-	dir="$func_dirname_result"
-	;;
-
-      *)
-	func_warning "\`-dlopen' is ignored for non-libtool libraries and objects"
-	continue
-	;;
-      esac
-
-      # Get the absolute pathname.
-      absdir=`cd "$dir" && pwd`
-      test -n "$absdir" && dir="$absdir"
-
-      # Now add the directory to shlibpath_var.
-      if eval "test -z \"\$$shlibpath_var\""; then
-	eval "$shlibpath_var=\"\$dir\""
-      else
-	eval "$shlibpath_var=\"\$dir:\$$shlibpath_var\""
-      fi
-    done
-
-    # This variable tells wrapper scripts just to set shlibpath_var
-    # rather than running their programs.
-    libtool_execute_magic="$magic"
-
-    # Check if any of the arguments is a wrapper script.
-    args=
-    for file
-    do
-      case $file in
-      -* | *.la | *.lo ) ;;
-      *)
-	# Do a test to see if this is really a libtool program.
-	if func_ltwrapper_script_p "$file"; then
-	  func_source "$file"
-	  # Transform arg to wrapped name.
-	  file="$progdir/$program"
-	elif func_ltwrapper_executable_p "$file"; then
-	  func_ltwrapper_scriptname "$file"
-	  func_source "$func_ltwrapper_scriptname_result"
-	  # Transform arg to wrapped name.
-	  file="$progdir/$program"
-	fi
-	;;
-      esac
-      # Quote arguments (to preserve shell metacharacters).
-      func_append_quoted args "$file"
-    done
-
-    if test "X$opt_dry_run" = Xfalse; then
-      if test -n "$shlibpath_var"; then
-	# Export the shlibpath_var.
-	eval "export $shlibpath_var"
-      fi
-
-      # Restore saved environment variables
-      for lt_var in LANG LANGUAGE LC_ALL LC_CTYPE LC_COLLATE LC_MESSAGES
-      do
-	eval "if test \"\${save_$lt_var+set}\" = set; then
-                $lt_var=\$save_$lt_var; export $lt_var
-	      else
-		$lt_unset $lt_var
-	      fi"
-      done
-
-      # Now prepare to actually exec the command.
-      exec_cmd="\$cmd$args"
-    else
-      # Display what would be done.
-      if test -n "$shlibpath_var"; then
-	eval "\$ECHO \"\$shlibpath_var=\$$shlibpath_var\""
-	echo "export $shlibpath_var"
-      fi
-      $ECHO "$cmd$args"
-      exit $EXIT_SUCCESS
-    fi
-}
-
-test "$opt_mode" = execute && func_mode_execute ${1+"$@"}
-
-
-# func_mode_finish arg...
-func_mode_finish ()
-{
-    $opt_debug
-    libs=
-    libdirs=
-    admincmds=
-
-    for opt in "$nonopt" ${1+"$@"}
-    do
-      if test -d "$opt"; then
-	func_append libdirs " $opt"
-
-      elif test -f "$opt"; then
-	if func_lalib_unsafe_p "$opt"; then
-	  func_append libs " $opt"
-	else
-	  func_warning "\`$opt' is not a valid libtool archive"
-	fi
-
-      else
-	func_fatal_error "invalid argument \`$opt'"
-      fi
-    done
-
-    if test -n "$libs"; then
-      if test -n "$lt_sysroot"; then
-        sysroot_regex=`$ECHO "$lt_sysroot" | $SED "$sed_make_literal_regex"`
-        sysroot_cmd="s/\([ ']\)$sysroot_regex/\1/g;"
-      else
-        sysroot_cmd=
-      fi
-
-      # Remove sysroot references
-      if $opt_dry_run; then
-        for lib in $libs; do
-          echo "removing references to $lt_sysroot and \`=' prefixes from $lib"
-        done
-      else
-        tmpdir=`func_mktempdir`
-        for lib in $libs; do
-	  sed -e "${sysroot_cmd} s/\([ ']-[LR]\)=/\1/g; s/\([ ']\)=/\1/g" $lib \
-	    > $tmpdir/tmp-la
-	  mv -f $tmpdir/tmp-la $lib
-	done
-        ${RM}r "$tmpdir"
-      fi
-    fi
-
-    if test -n "$finish_cmds$finish_eval" && test -n "$libdirs"; then
-      for libdir in $libdirs; do
-	if test -n "$finish_cmds"; then
-	  # Do each command in the finish commands.
-	  func_execute_cmds "$finish_cmds" 'admincmds="$admincmds
-'"$cmd"'"'
-	fi
-	if test -n "$finish_eval"; then
-	  # Do the single finish_eval.
-	  eval cmds=\"$finish_eval\"
-	  $opt_dry_run || eval "$cmds" || func_append admincmds "
-       $cmds"
-	fi
-      done
-    fi
-
-    # Exit here if they wanted silent mode.
-    $opt_silent && exit $EXIT_SUCCESS
-
-    if test -n "$finish_cmds$finish_eval" && test -n "$libdirs"; then
-      echo "----------------------------------------------------------------------"
-      echo "Libraries have been installed in:"
-      for libdir in $libdirs; do
-	$ECHO "   $libdir"
-      done
-      echo
-      echo "If you ever happen to want to link against installed libraries"
-      echo "in a given directory, LIBDIR, you must either use libtool, and"
-      echo "specify the full pathname of the library, or use the \`-LLIBDIR'"
-      echo "flag during linking and do at least one of the following:"
-      if test -n "$shlibpath_var"; then
-	echo "   - add LIBDIR to the \`$shlibpath_var' environment variable"
-	echo "     during execution"
-      fi
-      if test -n "$runpath_var"; then
-	echo "   - add LIBDIR to the \`$runpath_var' environment variable"
-	echo "     during linking"
-      fi
-      if test -n "$hardcode_libdir_flag_spec"; then
-	libdir=LIBDIR
-	eval flag=\"$hardcode_libdir_flag_spec\"
-
-	$ECHO "   - use the \`$flag' linker flag"
-      fi
-      if test -n "$admincmds"; then
-	$ECHO "   - have your system administrator run these commands:$admincmds"
-      fi
-      if test -f /etc/ld.so.conf; then
-	echo "   - have your system administrator add LIBDIR to \`/etc/ld.so.conf'"
-      fi
-      echo
-
-      echo "See any operating system documentation about shared libraries for"
-      case $host in
-	solaris2.[6789]|solaris2.1[0-9])
-	  echo "more information, such as the ld(1), crle(1) and ld.so(8) manual"
-	  echo "pages."
-	  ;;
-	*)
-	  echo "more information, such as the ld(1) and ld.so(8) manual pages."
-	  ;;
-      esac
-      echo "----------------------------------------------------------------------"
-    fi
-    exit $EXIT_SUCCESS
-}
-
-test "$opt_mode" = finish && func_mode_finish ${1+"$@"}
-
-
-# func_mode_install arg...
-func_mode_install ()
-{
-    $opt_debug
-    # There may be an optional sh(1) argument at the beginning of
-    # install_prog (especially on Windows NT).
-    if test "$nonopt" = "$SHELL" || test "$nonopt" = /bin/sh ||
-       # Allow the use of GNU shtool's install command.
-       case $nonopt in *shtool*) :;; *) false;; esac; then
-      # Aesthetically quote it.
-      func_quote_for_eval "$nonopt"
-      install_prog="$func_quote_for_eval_result "
-      arg=$1
-      shift
-    else
-      install_prog=
-      arg=$nonopt
-    fi
-
-    # The real first argument should be the name of the installation program.
-    # Aesthetically quote it.
-    func_quote_for_eval "$arg"
-    func_append install_prog "$func_quote_for_eval_result"
-    install_shared_prog=$install_prog
-    case " $install_prog " in
-      *[\\\ /]cp\ *) install_cp=: ;;
-      *) install_cp=false ;;
-    esac
-
-    # We need to accept at least all the BSD install flags.
-    dest=
-    files=
-    opts=
-    prev=
-    install_type=
-    isdir=no
-    stripme=
-    no_mode=:
-    for arg
-    do
-      arg2=
-      if test -n "$dest"; then
-	func_append files " $dest"
-	dest=$arg
-	continue
-      fi
-
-      case $arg in
-      -d) isdir=yes ;;
-      -f)
-	if $install_cp; then :; else
-	  prev=$arg
-	fi
-	;;
-      -g | -m | -o)
-	prev=$arg
-	;;
-      -s)
-	stripme=" -s"
-	continue
-	;;
-      -*)
-	;;
-      *)
-	# If the previous option needed an argument, then skip it.
-	if test -n "$prev"; then
-	  if test "x$prev" = x-m && test -n "$install_override_mode"; then
-	    arg2=$install_override_mode
-	    no_mode=false
-	  fi
-	  prev=
-	else
-	  dest=$arg
-	  continue
-	fi
-	;;
-      esac
-
-      # Aesthetically quote the argument.
-      func_quote_for_eval "$arg"
-      func_append install_prog " $func_quote_for_eval_result"
-      if test -n "$arg2"; then
-	func_quote_for_eval "$arg2"
-      fi
-      func_append install_shared_prog " $func_quote_for_eval_result"
-    done
-
-    test -z "$install_prog" && \
-      func_fatal_help "you must specify an install program"
-
-    test -n "$prev" && \
-      func_fatal_help "the \`$prev' option requires an argument"
-
-    if test -n "$install_override_mode" && $no_mode; then
-      if $install_cp; then :; else
-	func_quote_for_eval "$install_override_mode"
-	func_append install_shared_prog " -m $func_quote_for_eval_result"
-      fi
-    fi
-
-    if test -z "$files"; then
-      if test -z "$dest"; then
-	func_fatal_help "no file or destination specified"
-      else
-	func_fatal_help "you must specify a destination"
-      fi
-    fi
-
-    # Strip any trailing slash from the destination.
-    func_stripname '' '/' "$dest"
-    dest=$func_stripname_result
-
-    # Check to see that the destination is a directory.
-    test -d "$dest" && isdir=yes
-    if test "$isdir" = yes; then
-      destdir="$dest"
-      destname=
-    else
-      func_dirname_and_basename "$dest" "" "."
-      destdir="$func_dirname_result"
-      destname="$func_basename_result"
-
-      # Not a directory, so check to see that there is only one file specified.
-      set dummy $files; shift
-      test "$#" -gt 1 && \
-	func_fatal_help "\`$dest' is not a directory"
-    fi
-    case $destdir in
-    [\\/]* | [A-Za-z]:[\\/]*) ;;
-    *)
-      for file in $files; do
-	case $file in
-	*.lo) ;;
-	*)
-	  func_fatal_help "\`$destdir' must be an absolute directory name"
-	  ;;
-	esac
-      done
-      ;;
-    esac
-
-    # This variable tells wrapper scripts just to set variables rather
-    # than running their programs.
-    libtool_install_magic="$magic"
-
-    staticlibs=
-    future_libdirs=
-    current_libdirs=
-    for file in $files; do
-
-      # Do each installation.
-      case $file in
-      *.$libext)
-	# Do the static libraries later.
-	func_append staticlibs " $file"
-	;;
-
-      *.la)
-	func_resolve_sysroot "$file"
-	file=$func_resolve_sysroot_result
-
-	# Check to see that this really is a libtool archive.
-	func_lalib_unsafe_p "$file" \
-	  || func_fatal_help "\`$file' is not a valid libtool archive"
-
-	library_names=
-	old_library=
-	relink_command=
-	func_source "$file"
-
-	# Add the libdir to current_libdirs if it is the destination.
-	if test "X$destdir" = "X$libdir"; then
-	  case "$current_libdirs " in
-	  *" $libdir "*) ;;
-	  *) func_append current_libdirs " $libdir" ;;
-	  esac
-	else
-	  # Note the libdir as a future libdir.
-	  case "$future_libdirs " in
-	  *" $libdir "*) ;;
-	  *) func_append future_libdirs " $libdir" ;;
-	  esac
-	fi
-
-	func_dirname "$file" "/" ""
-	dir="$func_dirname_result"
-	func_append dir "$objdir"
-
-	if test -n "$relink_command"; then
-	  # Determine the prefix the user has applied to our future dir.
-	  inst_prefix_dir=`$ECHO "$destdir" | $SED -e "s%$libdir\$%%"`
-
-	  # Don't allow the user to place us outside of our expected
-	  # location b/c this prevents finding dependent libraries that
-	  # are installed to the same prefix.
-	  # At present, this check doesn't affect windows .dll's that
-	  # are installed into $libdir/../bin (currently, that works fine)
-	  # but it's something to keep an eye on.
-	  test "$inst_prefix_dir" = "$destdir" && \
-	    func_fatal_error "error: cannot install \`$file' to a directory not ending in $libdir"
-
-	  if test -n "$inst_prefix_dir"; then
-	    # Stick the inst_prefix_dir data into the link command.
-	    relink_command=`$ECHO "$relink_command" | $SED "s%@inst_prefix_dir@%-inst-prefix-dir $inst_prefix_dir%"`
-	  else
-	    relink_command=`$ECHO "$relink_command" | $SED "s%@inst_prefix_dir@%%"`
-	  fi
-
-	  func_warning "relinking \`$file'"
-	  func_show_eval "$relink_command" \
-	    'func_fatal_error "error: relink \`$file'\'' with the above command before installing it"'
-	fi
-
-	# See the names of the shared library.
-	set dummy $library_names; shift
-	if test -n "$1"; then
-	  realname="$1"
-	  shift
-
-	  srcname="$realname"
-	  test -n "$relink_command" && srcname="$realname"T
-
-	  # Install the shared library and build the symlinks.
-	  func_show_eval "$install_shared_prog $dir/$srcname $destdir/$realname" \
-	      'exit $?'
-	  tstripme="$stripme"
-	  case $host_os in
-	  cygwin* | mingw* | pw32* | cegcc*)
-	    case $realname in
-	    *.dll.a)
-	      tstripme=""
-	      ;;
-	    esac
-	    ;;
-	  esac
-	  if test -n "$tstripme" && test -n "$striplib"; then
-	    func_show_eval "$striplib $destdir/$realname" 'exit $?'
-	  fi
-
-	  if test "$#" -gt 0; then
-	    # Delete the old symlinks, and create new ones.
-	    # Try `ln -sf' first, because the `ln' binary might depend on
-	    # the symlink we replace!  Solaris /bin/ln does not understand -f,
-	    # so we also need to try rm && ln -s.
-	    for linkname
-	    do
-	      test "$linkname" != "$realname" \
-		&& func_show_eval "(cd $destdir && { $LN_S -f $realname $linkname || { $RM $linkname && $LN_S $realname $linkname; }; })"
-	    done
-	  fi
-
-	  # Do each command in the postinstall commands.
-	  lib="$destdir/$realname"
-	  func_execute_cmds "$postinstall_cmds" 'exit $?'
-	fi
-
-	# Install the pseudo-library for information purposes.
-	func_basename "$file"
-	name="$func_basename_result"
-	instname="$dir/$name"i
-	func_show_eval "$install_prog $instname $destdir/$name" 'exit $?'
-
-	# Maybe install the static library, too.
-	test -n "$old_library" && func_append staticlibs " $dir/$old_library"
-	;;
-
-      *.lo)
-	# Install (i.e. copy) a libtool object.
-
-	# Figure out destination file name, if it wasn't already specified.
-	if test -n "$destname"; then
-	  destfile="$destdir/$destname"
-	else
-	  func_basename "$file"
-	  destfile="$func_basename_result"
-	  destfile="$destdir/$destfile"
-	fi
-
-	# Deduce the name of the destination old-style object file.
-	case $destfile in
-	*.lo)
-	  func_lo2o "$destfile"
-	  staticdest=$func_lo2o_result
-	  ;;
-	*.$objext)
-	  staticdest="$destfile"
-	  destfile=
-	  ;;
-	*)
-	  func_fatal_help "cannot copy a libtool object to \`$destfile'"
-	  ;;
-	esac
-
-	# Install the libtool object if requested.
-	test -n "$destfile" && \
-	  func_show_eval "$install_prog $file $destfile" 'exit $?'
-
-	# Install the old object if enabled.
-	if test "$build_old_libs" = yes; then
-	  # Deduce the name of the old-style object file.
-	  func_lo2o "$file"
-	  staticobj=$func_lo2o_result
-	  func_show_eval "$install_prog \$staticobj \$staticdest" 'exit $?'
-	fi
-	exit $EXIT_SUCCESS
-	;;
-
-      *)
-	# Figure out destination file name, if it wasn't already specified.
-	if test -n "$destname"; then
-	  destfile="$destdir/$destname"
-	else
-	  func_basename "$file"
-	  destfile="$func_basename_result"
-	  destfile="$destdir/$destfile"
-	fi
-
-	# If the file is missing, and there is a .exe on the end, strip it
-	# because it is most likely a libtool script we actually want to
-	# install
-	stripped_ext=""
-	case $file in
-	  *.exe)
-	    if test ! -f "$file"; then
-	      func_stripname '' '.exe' "$file"
-	      file=$func_stripname_result
-	      stripped_ext=".exe"
-	    fi
-	    ;;
-	esac
-
-	# Do a test to see if this is really a libtool program.
-	case $host in
-	*cygwin* | *mingw*)
-	    if func_ltwrapper_executable_p "$file"; then
-	      func_ltwrapper_scriptname "$file"
-	      wrapper=$func_ltwrapper_scriptname_result
-	    else
-	      func_stripname '' '.exe' "$file"
-	      wrapper=$func_stripname_result
-	    fi
-	    ;;
-	*)
-	    wrapper=$file
-	    ;;
-	esac
-	if func_ltwrapper_script_p "$wrapper"; then
-	  notinst_deplibs=
-	  relink_command=
-
-	  func_source "$wrapper"
-
-	  # Check the variables that should have been set.
-	  test -z "$generated_by_libtool_version" && \
-	    func_fatal_error "invalid libtool wrapper script \`$wrapper'"
-
-	  finalize=yes
-	  for lib in $notinst_deplibs; do
-	    # Check to see that each library is installed.
-	    libdir=
-	    if test -f "$lib"; then
-	      func_source "$lib"
-	    fi
-	    libfile="$libdir/"`$ECHO "$lib" | $SED 's%^.*/%%g'` ### testsuite: skip nested quoting test
-	    if test -n "$libdir" && test ! -f "$libfile"; then
-	      func_warning "\`$lib' has not been installed in \`$libdir'"
-	      finalize=no
-	    fi
-	  done
-
-	  relink_command=
-	  func_source "$wrapper"
-
-	  outputname=
-	  if test "$fast_install" = no && test -n "$relink_command"; then
-	    $opt_dry_run || {
-	      if test "$finalize" = yes; then
-	        tmpdir=`func_mktempdir`
-		func_basename "$file$stripped_ext"
-		file="$func_basename_result"
-	        outputname="$tmpdir/$file"
-	        # Replace the output file specification.
-	        relink_command=`$ECHO "$relink_command" | $SED 's%@OUTPUT@%'"$outputname"'%g'`
-
-	        $opt_silent || {
-	          func_quote_for_expand "$relink_command"
-		  eval "func_echo $func_quote_for_expand_result"
-	        }
-	        if eval "$relink_command"; then :
-	          else
-		  func_error "error: relink \`$file' with the above command before installing it"
-		  $opt_dry_run || ${RM}r "$tmpdir"
-		  continue
-	        fi
-	        file="$outputname"
-	      else
-	        func_warning "cannot relink \`$file'"
-	      fi
-	    }
-	  else
-	    # Install the binary that we compiled earlier.
-	    file=`$ECHO "$file$stripped_ext" | $SED "s%\([^/]*\)$%$objdir/\1%"`
-	  fi
-	fi
-
-	# remove .exe since cygwin /usr/bin/install will append another
-	# one anyway
-	case $install_prog,$host in
-	*/usr/bin/install*,*cygwin*)
-	  case $file:$destfile in
-	  *.exe:*.exe)
-	    # this is ok
-	    ;;
-	  *.exe:*)
-	    destfile=$destfile.exe
-	    ;;
-	  *:*.exe)
-	    func_stripname '' '.exe' "$destfile"
-	    destfile=$func_stripname_result
-	    ;;
-	  esac
-	  ;;
-	esac
-	func_show_eval "$install_prog\$stripme \$file \$destfile" 'exit $?'
-	$opt_dry_run || if test -n "$outputname"; then
-	  ${RM}r "$tmpdir"
-	fi
-	;;
-      esac
-    done
-
-    for file in $staticlibs; do
-      func_basename "$file"
-      name="$func_basename_result"
-
-      # Set up the ranlib parameters.
-      oldlib="$destdir/$name"
-      func_to_tool_file "$oldlib" func_convert_file_msys_to_w32
-      tool_oldlib=$func_to_tool_file_result
-
-      func_show_eval "$install_prog \$file \$oldlib" 'exit $?'
-
-      if test -n "$stripme" && test -n "$old_striplib"; then
-	func_show_eval "$old_striplib $tool_oldlib" 'exit $?'
-      fi
-
-      # Do each command in the postinstall commands.
-      func_execute_cmds "$old_postinstall_cmds" 'exit $?'
-    done
-
-    test -n "$future_libdirs" && \
-      func_warning "remember to run \`$progname --finish$future_libdirs'"
-
-    if test -n "$current_libdirs"; then
-      # Maybe just do a dry run.
-      $opt_dry_run && current_libdirs=" -n$current_libdirs"
-      exec_cmd='$SHELL $progpath $preserve_args --finish$current_libdirs'
-    else
-      exit $EXIT_SUCCESS
-    fi
-}
-
-test "$opt_mode" = install && func_mode_install ${1+"$@"}
-
-
-# func_generate_dlsyms outputname originator pic_p
-# Extract symbols from dlprefiles and create ${outputname}S.o with
-# a dlpreopen symbol table.
-func_generate_dlsyms ()
-{
-    $opt_debug
-    my_outputname="$1"
-    my_originator="$2"
-    my_pic_p="${3-no}"
-    my_prefix=`$ECHO "$my_originator" | sed 's%[^a-zA-Z0-9]%_%g'`
-    my_dlsyms=
-
-    if test -n "$dlfiles$dlprefiles" || test "$dlself" != no; then
-      if test -n "$NM" && test -n "$global_symbol_pipe"; then
-	my_dlsyms="${my_outputname}S.c"
-      else
-	func_error "not configured to extract global symbols from dlpreopened files"
-      fi
-    fi
-
-    if test -n "$my_dlsyms"; then
-      case $my_dlsyms in
-      "") ;;
-      *.c)
-	# Discover the nlist of each of the dlfiles.
-	nlist="$output_objdir/${my_outputname}.nm"
-
-	func_show_eval "$RM $nlist ${nlist}S ${nlist}T"
-
-	# Parse the name list into a source file.
-	func_verbose "creating $output_objdir/$my_dlsyms"
-
-	$opt_dry_run || $ECHO > "$output_objdir/$my_dlsyms" "\
-/* $my_dlsyms - symbol resolution table for \`$my_outputname' dlsym emulation. */
-/* Generated by $PROGRAM (GNU $PACKAGE$TIMESTAMP) $VERSION */
-
-#ifdef __cplusplus
-extern \"C\" {
-#endif
-
-#if defined(__GNUC__) && (((__GNUC__ == 4) && (__GNUC_MINOR__ >= 4)) || (__GNUC__ > 4))
-#pragma GCC diagnostic ignored \"-Wstrict-prototypes\"
-#endif
-
-/* Keep this code in sync between libtool.m4, ltmain, lt_system.h, and tests.  */
-#if defined(_WIN32) || defined(__CYGWIN__) || defined(_WIN32_WCE)
-/* DATA imports from DLLs on WIN32 con't be const, because runtime
-   relocations are performed -- see ld's documentation on pseudo-relocs.  */
-# define LT_DLSYM_CONST
-#elif defined(__osf__)
-/* This system does not cope well with relocations in const data.  */
-# define LT_DLSYM_CONST
-#else
-# define LT_DLSYM_CONST const
-#endif
-
-/* External symbol declarations for the compiler. */\
-"
-
-	if test "$dlself" = yes; then
-	  func_verbose "generating symbol list for \`$output'"
-
-	  $opt_dry_run || echo ': @PROGRAM@ ' > "$nlist"
-
-	  # Add our own program objects to the symbol list.
-	  progfiles=`$ECHO "$objs$old_deplibs" | $SP2NL | $SED "$lo2o" | $NL2SP`
-	  for progfile in $progfiles; do
-	    func_to_tool_file "$progfile" func_convert_file_msys_to_w32
-	    func_verbose "extracting global C symbols from \`$func_to_tool_file_result'"
-	    $opt_dry_run || eval "$NM $func_to_tool_file_result | $global_symbol_pipe >> '$nlist'"
-	  done
-
-	  if test -n "$exclude_expsyms"; then
-	    $opt_dry_run || {
-	      eval '$EGREP -v " ($exclude_expsyms)$" "$nlist" > "$nlist"T'
-	      eval '$MV "$nlist"T "$nlist"'
-	    }
-	  fi
-
-	  if test -n "$export_symbols_regex"; then
-	    $opt_dry_run || {
-	      eval '$EGREP -e "$export_symbols_regex" "$nlist" > "$nlist"T'
-	      eval '$MV "$nlist"T "$nlist"'
-	    }
-	  fi
-
-	  # Prepare the list of exported symbols
-	  if test -z "$export_symbols"; then
-	    export_symbols="$output_objdir/$outputname.exp"
-	    $opt_dry_run || {
-	      $RM $export_symbols
-	      eval "${SED} -n -e '/^: @PROGRAM@ $/d' -e 's/^.* \(.*\)$/\1/p' "'< "$nlist" > "$export_symbols"'
-	      case $host in
-	      *cygwin* | *mingw* | *cegcc* )
-                eval "echo EXPORTS "'> "$output_objdir/$outputname.def"'
-                eval 'cat "$export_symbols" >> "$output_objdir/$outputname.def"'
-	        ;;
-	      esac
-	    }
-	  else
-	    $opt_dry_run || {
-	      eval "${SED} -e 's/\([].[*^$]\)/\\\\\1/g' -e 's/^/ /' -e 's/$/$/'"' < "$export_symbols" > "$output_objdir/$outputname.exp"'
-	      eval '$GREP -f "$output_objdir/$outputname.exp" < "$nlist" > "$nlist"T'
-	      eval '$MV "$nlist"T "$nlist"'
-	      case $host in
-	        *cygwin* | *mingw* | *cegcc* )
-	          eval "echo EXPORTS "'> "$output_objdir/$outputname.def"'
-	          eval 'cat "$nlist" >> "$output_objdir/$outputname.def"'
-	          ;;
-	      esac
-	    }
-	  fi
-	fi
-
-	for dlprefile in $dlprefiles; do
-	  func_verbose "extracting global C symbols from \`$dlprefile'"
-	  func_basename "$dlprefile"
-	  name="$func_basename_result"
-          case $host in
-	    *cygwin* | *mingw* | *cegcc* )
-	      # if an import library, we need to obtain dlname
-	      if func_win32_import_lib_p "$dlprefile"; then
-	        func_tr_sh "$dlprefile"
-	        eval "curr_lafile=\$libfile_$func_tr_sh_result"
-	        dlprefile_dlbasename=""
-	        if test -n "$curr_lafile" && func_lalib_p "$curr_lafile"; then
-	          # Use subshell, to avoid clobbering current variable values
-	          dlprefile_dlname=`source "$curr_lafile" && echo "$dlname"`
-	          if test -n "$dlprefile_dlname" ; then
-	            func_basename "$dlprefile_dlname"
-	            dlprefile_dlbasename="$func_basename_result"
-	          else
-	            # no lafile. user explicitly requested -dlpreopen <import library>.
-	            $sharedlib_from_linklib_cmd "$dlprefile"
-	            dlprefile_dlbasename=$sharedlib_from_linklib_result
-	          fi
-	        fi
-	        $opt_dry_run || {
-	          if test -n "$dlprefile_dlbasename" ; then
-	            eval '$ECHO ": $dlprefile_dlbasename" >> "$nlist"'
-	          else
-	            func_warning "Could not compute DLL name from $name"
-	            eval '$ECHO ": $name " >> "$nlist"'
-	          fi
-	          func_to_tool_file "$dlprefile" func_convert_file_msys_to_w32
-	          eval "$NM \"$func_to_tool_file_result\" 2>/dev/null | $global_symbol_pipe |
-	            $SED -e '/I __imp/d' -e 's/I __nm_/D /;s/_nm__//' >> '$nlist'"
-	        }
-	      else # not an import lib
-	        $opt_dry_run || {
-	          eval '$ECHO ": $name " >> "$nlist"'
-	          func_to_tool_file "$dlprefile" func_convert_file_msys_to_w32
-	          eval "$NM \"$func_to_tool_file_result\" 2>/dev/null | $global_symbol_pipe >> '$nlist'"
-	        }
-	      fi
-	    ;;
-	    *)
-	      $opt_dry_run || {
-	        eval '$ECHO ": $name " >> "$nlist"'
-	        func_to_tool_file "$dlprefile" func_convert_file_msys_to_w32
-	        eval "$NM \"$func_to_tool_file_result\" 2>/dev/null | $global_symbol_pipe >> '$nlist'"
-	      }
-	    ;;
-          esac
-	done
-
-	$opt_dry_run || {
-	  # Make sure we have at least an empty file.
-	  test -f "$nlist" || : > "$nlist"
-
-	  if test -n "$exclude_expsyms"; then
-	    $EGREP -v " ($exclude_expsyms)$" "$nlist" > "$nlist"T
-	    $MV "$nlist"T "$nlist"
-	  fi
-
-	  # Try sorting and uniquifying the output.
-	  if $GREP -v "^: " < "$nlist" |
-	      if sort -k 3 </dev/null >/dev/null 2>&1; then
-		sort -k 3
-	      else
-		sort +2
-	      fi |
-	      uniq > "$nlist"S; then
-	    :
-	  else
-	    $GREP -v "^: " < "$nlist" > "$nlist"S
-	  fi
-
-	  if test -f "$nlist"S; then
-	    eval "$global_symbol_to_cdecl"' < "$nlist"S >> "$output_objdir/$my_dlsyms"'
-	  else
-	    echo '/* NONE */' >> "$output_objdir/$my_dlsyms"
-	  fi
-
-	  echo >> "$output_objdir/$my_dlsyms" "\
-
-/* The mapping between symbol names and symbols.  */
-typedef struct {
-  const char *name;
-  void *address;
-} lt_dlsymlist;
-extern LT_DLSYM_CONST lt_dlsymlist
-lt_${my_prefix}_LTX_preloaded_symbols[];
-LT_DLSYM_CONST lt_dlsymlist
-lt_${my_prefix}_LTX_preloaded_symbols[] =
-{\
-  { \"$my_originator\", (void *) 0 },"
-
-	  case $need_lib_prefix in
-	  no)
-	    eval "$global_symbol_to_c_name_address" < "$nlist" >> "$output_objdir/$my_dlsyms"
-	    ;;
-	  *)
-	    eval "$global_symbol_to_c_name_address_lib_prefix" < "$nlist" >> "$output_objdir/$my_dlsyms"
-	    ;;
-	  esac
-	  echo >> "$output_objdir/$my_dlsyms" "\
-  {0, (void *) 0}
-};
-
-/* This works around a problem in FreeBSD linker */
-#ifdef FREEBSD_WORKAROUND
-static const void *lt_preloaded_setup() {
-  return lt_${my_prefix}_LTX_preloaded_symbols;
-}
-#endif
-
-#ifdef __cplusplus
-}
-#endif\
-"
-	} # !$opt_dry_run
-
-	pic_flag_for_symtable=
-	case "$compile_command " in
-	*" -static "*) ;;
-	*)
-	  case $host in
-	  # compiling the symbol table file with pic_flag works around
-	  # a FreeBSD bug that causes programs to crash when -lm is
-	  # linked before any other PIC object.  But we must not use
-	  # pic_flag when linking with -static.  The problem exists in
-	  # FreeBSD 2.2.6 and is fixed in FreeBSD 3.1.
-	  *-*-freebsd2.*|*-*-freebsd3.0*|*-*-freebsdelf3.0*)
-	    pic_flag_for_symtable=" $pic_flag -DFREEBSD_WORKAROUND" ;;
-	  *-*-hpux*)
-	    pic_flag_for_symtable=" $pic_flag"  ;;
-	  *)
-	    if test "X$my_pic_p" != Xno; then
-	      pic_flag_for_symtable=" $pic_flag"
-	    fi
-	    ;;
-	  esac
-	  ;;
-	esac
-	symtab_cflags=
-	for arg in $LTCFLAGS; do
-	  case $arg in
-	  -pie | -fpie | -fPIE) ;;
-	  *) func_append symtab_cflags " $arg" ;;
-	  esac
-	done
-
-	# Now compile the dynamic symbol file.
-	func_show_eval '(cd $output_objdir && $LTCC$symtab_cflags -c$no_builtin_flag$pic_flag_for_symtable "$my_dlsyms")' 'exit $?'
-
-	# Clean up the generated files.
-	func_show_eval '$RM "$output_objdir/$my_dlsyms" "$nlist" "${nlist}S" "${nlist}T"'
-
-	# Transform the symbol file into the correct name.
-	symfileobj="$output_objdir/${my_outputname}S.$objext"
-	case $host in
-	*cygwin* | *mingw* | *cegcc* )
-	  if test -f "$output_objdir/$my_outputname.def"; then
-	    compile_command=`$ECHO "$compile_command" | $SED "s%@SYMFILE@%$output_objdir/$my_outputname.def $symfileobj%"`
-	    finalize_command=`$ECHO "$finalize_command" | $SED "s%@SYMFILE@%$output_objdir/$my_outputname.def $symfileobj%"`
-	  else
-	    compile_command=`$ECHO "$compile_command" | $SED "s%@SYMFILE@%$symfileobj%"`
-	    finalize_command=`$ECHO "$finalize_command" | $SED "s%@SYMFILE@%$symfileobj%"`
-	  fi
-	  ;;
-	*)
-	  compile_command=`$ECHO "$compile_command" | $SED "s%@SYMFILE@%$symfileobj%"`
-	  finalize_command=`$ECHO "$finalize_command" | $SED "s%@SYMFILE@%$symfileobj%"`
-	  ;;
-	esac
-	;;
-      *)
-	func_fatal_error "unknown suffix for \`$my_dlsyms'"
-	;;
-      esac
-    else
-      # We keep going just in case the user didn't refer to
-      # lt_preloaded_symbols.  The linker will fail if global_symbol_pipe
-      # really was required.
-
-      # Nullify the symbol file.
-      compile_command=`$ECHO "$compile_command" | $SED "s% @SYMFILE@%%"`
-      finalize_command=`$ECHO "$finalize_command" | $SED "s% @SYMFILE@%%"`
-    fi
-}
-
-# func_win32_libid arg
-# return the library type of file 'arg'
-#
-# Need a lot of goo to handle *both* DLLs and import libs
-# Has to be a shell function in order to 'eat' the argument
-# that is supplied when $file_magic_command is called.
-# Despite the name, also deal with 64 bit binaries.
-func_win32_libid ()
-{
-  $opt_debug
-  win32_libid_type="unknown"
-  win32_fileres=`file -L $1 2>/dev/null`
-  case $win32_fileres in
-  *ar\ archive\ import\ library*) # definitely import
-    win32_libid_type="x86 archive import"
-    ;;
-  *ar\ archive*) # could be an import, or static
-    # Keep the egrep pattern in sync with the one in _LT_CHECK_MAGIC_METHOD.
-    if eval $OBJDUMP -f $1 | $SED -e '10q' 2>/dev/null |
-       $EGREP 'file format (pei*-i386(.*architecture: i386)?|pe-arm-wince|pe-x86-64)' >/dev/null; then
-      func_to_tool_file "$1" func_convert_file_msys_to_w32
-      win32_nmres=`eval $NM -f posix -A \"$func_to_tool_file_result\" |
-	$SED -n -e '
-	    1,100{
-		/ I /{
-		    s,.*,import,
-		    p
-		    q
-		}
-	    }'`
-      case $win32_nmres in
-      import*)  win32_libid_type="x86 archive import";;
-      *)        win32_libid_type="x86 archive static";;
-      esac
-    fi
-    ;;
-  *DLL*)
-    win32_libid_type="x86 DLL"
-    ;;
-  *executable*) # but shell scripts are "executable" too...
-    case $win32_fileres in
-    *MS\ Windows\ PE\ Intel*)
-      win32_libid_type="x86 DLL"
-      ;;
-    esac
-    ;;
-  esac
-  $ECHO "$win32_libid_type"
-}
-
-# func_cygming_dll_for_implib ARG
-#
-# Platform-specific function to extract the
-# name of the DLL associated with the specified
-# import library ARG.
-# Invoked by eval'ing the libtool variable
-#    $sharedlib_from_linklib_cmd
-# Result is available in the variable
-#    $sharedlib_from_linklib_result
-func_cygming_dll_for_implib ()
-{
-  $opt_debug
-  sharedlib_from_linklib_result=`$DLLTOOL --identify-strict --identify "$1"`
-}
-
-# func_cygming_dll_for_implib_fallback_core SECTION_NAME LIBNAMEs
-#
-# The is the core of a fallback implementation of a
-# platform-specific function to extract the name of the
-# DLL associated with the specified import library LIBNAME.
-#
-# SECTION_NAME is either .idata$6 or .idata$7, depending
-# on the platform and compiler that created the implib.
-#
-# Echos the name of the DLL associated with the
-# specified import library.
-func_cygming_dll_for_implib_fallback_core ()
-{
-  $opt_debug
-  match_literal=`$ECHO "$1" | $SED "$sed_make_literal_regex"`
-  $OBJDUMP -s --section "$1" "$2" 2>/dev/null |
-    $SED '/^Contents of section '"$match_literal"':/{
-      # Place marker at beginning of archive member dllname section
-      s/.*/====MARK====/
-      p
-      d
-    }
-    # These lines can sometimes be longer than 43 characters, but
-    # are always uninteresting
-    /:[	 ]*file format pe[i]\{,1\}-/d
-    /^In archive [^:]*:/d
-    # Ensure marker is printed
-    /^====MARK====/p
-    # Remove all lines with less than 43 characters
-    /^.\{43\}/!d
-    # From remaining lines, remove first 43 characters
-    s/^.\{43\}//' |
-    $SED -n '
-      # Join marker and all lines until next marker into a single line
-      /^====MARK====/ b para
-      H
-      $ b para
-      b
-      :para
-      x
-      s/\n//g
-      # Remove the marker
-      s/^====MARK====//
-      # Remove trailing dots and whitespace
-      s/[\. \t]*$//
-      # Print
-      /./p' |
-    # we now have a list, one entry per line, of the stringified
-    # contents of the appropriate section of all members of the
-    # archive which possess that section. Heuristic: eliminate
-    # all those which have a first or second character that is
-    # a '.' (that is, objdump's representation of an unprintable
-    # character.) This should work for all archives with less than
-    # 0x302f exports -- but will fail for DLLs whose name actually
-    # begins with a literal '.' or a single character followed by
-    # a '.'.
-    #
-    # Of those that remain, print the first one.
-    $SED -e '/^\./d;/^.\./d;q'
-}
-
-# func_cygming_gnu_implib_p ARG
-# This predicate returns with zero status (TRUE) if
-# ARG is a GNU/binutils-style import library. Returns
-# with nonzero status (FALSE) otherwise.
-func_cygming_gnu_implib_p ()
-{
-  $opt_debug
-  func_to_tool_file "$1" func_convert_file_msys_to_w32
-  func_cygming_gnu_implib_tmp=`$NM "$func_to_tool_file_result" | eval "$global_symbol_pipe" | $EGREP ' (_head_[A-Za-z0-9_]+_[ad]l*|[A-Za-z0-9_]+_[ad]l*_iname)$'`
-  test -n "$func_cygming_gnu_implib_tmp"
-}
-
-# func_cygming_ms_implib_p ARG
-# This predicate returns with zero status (TRUE) if
-# ARG is an MS-style import library. Returns
-# with nonzero status (FALSE) otherwise.
-func_cygming_ms_implib_p ()
-{
-  $opt_debug
-  func_to_tool_file "$1" func_convert_file_msys_to_w32
-  func_cygming_ms_implib_tmp=`$NM "$func_to_tool_file_result" | eval "$global_symbol_pipe" | $GREP '_NULL_IMPORT_DESCRIPTOR'`
-  test -n "$func_cygming_ms_implib_tmp"
-}
-
-# func_cygming_dll_for_implib_fallback ARG
-# Platform-specific function to extract the
-# name of the DLL associated with the specified
-# import library ARG.
-#
-# This fallback implementation is for use when $DLLTOOL
-# does not support the --identify-strict option.
-# Invoked by eval'ing the libtool variable
-#    $sharedlib_from_linklib_cmd
-# Result is available in the variable
-#    $sharedlib_from_linklib_result
-func_cygming_dll_for_implib_fallback ()
-{
-  $opt_debug
-  if func_cygming_gnu_implib_p "$1" ; then
-    # binutils import library
-    sharedlib_from_linklib_result=`func_cygming_dll_for_implib_fallback_core '.idata$7' "$1"`
-  elif func_cygming_ms_implib_p "$1" ; then
-    # ms-generated import library
-    sharedlib_from_linklib_result=`func_cygming_dll_for_implib_fallback_core '.idata$6' "$1"`
-  else
-    # unknown
-    sharedlib_from_linklib_result=""
-  fi
-}
-
-
-# func_extract_an_archive dir oldlib
-func_extract_an_archive ()
-{
-    $opt_debug
-    f_ex_an_ar_dir="$1"; shift
-    f_ex_an_ar_oldlib="$1"
-    if test "$lock_old_archive_extraction" = yes; then
-      lockfile=$f_ex_an_ar_oldlib.lock
-      until $opt_dry_run || ln "$progpath" "$lockfile" 2>/dev/null; do
-	func_echo "Waiting for $lockfile to be removed"
-	sleep 2
-      done
-    fi
-    func_show_eval "(cd \$f_ex_an_ar_dir && $AR x \"\$f_ex_an_ar_oldlib\")" \
-		   'stat=$?; rm -f "$lockfile"; exit $stat'
-    if test "$lock_old_archive_extraction" = yes; then
-      $opt_dry_run || rm -f "$lockfile"
-    fi
-    if ($AR t "$f_ex_an_ar_oldlib" | sort | sort -uc >/dev/null 2>&1); then
-     :
-    else
-      func_fatal_error "object name conflicts in archive: $f_ex_an_ar_dir/$f_ex_an_ar_oldlib"
-    fi
-}
-
-
-# func_extract_archives gentop oldlib ...
-func_extract_archives ()
-{
-    $opt_debug
-    my_gentop="$1"; shift
-    my_oldlibs=${1+"$@"}
-    my_oldobjs=""
-    my_xlib=""
-    my_xabs=""
-    my_xdir=""
-
-    for my_xlib in $my_oldlibs; do
-      # Extract the objects.
-      case $my_xlib in
-	[\\/]* | [A-Za-z]:[\\/]*) my_xabs="$my_xlib" ;;
-	*) my_xabs=`pwd`"/$my_xlib" ;;
-      esac
-      func_basename "$my_xlib"
-      my_xlib="$func_basename_result"
-      my_xlib_u=$my_xlib
-      while :; do
-        case " $extracted_archives " in
-	*" $my_xlib_u "*)
-	  func_arith $extracted_serial + 1
-	  extracted_serial=$func_arith_result
-	  my_xlib_u=lt$extracted_serial-$my_xlib ;;
-	*) break ;;
-	esac
-      done
-      extracted_archives="$extracted_archives $my_xlib_u"
-      my_xdir="$my_gentop/$my_xlib_u"
-
-      func_mkdir_p "$my_xdir"
-
-      case $host in
-      *-darwin*)
-	func_verbose "Extracting $my_xabs"
-	# Do not bother doing anything if just a dry run
-	$opt_dry_run || {
-	  darwin_orig_dir=`pwd`
-	  cd $my_xdir || exit $?
-	  darwin_archive=$my_xabs
-	  darwin_curdir=`pwd`
-	  darwin_base_archive=`basename "$darwin_archive"`
-	  darwin_arches=`$LIPO -info "$darwin_archive" 2>/dev/null | $GREP Architectures 2>/dev/null || true`
-	  if test -n "$darwin_arches"; then
-	    darwin_arches=`$ECHO "$darwin_arches" | $SED -e 's/.*are://'`
-	    darwin_arch=
-	    func_verbose "$darwin_base_archive has multiple architectures $darwin_arches"
-	    for darwin_arch in  $darwin_arches ; do
-	      func_mkdir_p "unfat-$$/${darwin_base_archive}-${darwin_arch}"
-	      $LIPO -thin $darwin_arch -output "unfat-$$/${darwin_base_archive}-${darwin_arch}/${darwin_base_archive}" "${darwin_archive}"
-	      cd "unfat-$$/${darwin_base_archive}-${darwin_arch}"
-	      func_extract_an_archive "`pwd`" "${darwin_base_archive}"
-	      cd "$darwin_curdir"
-	      $RM "unfat-$$/${darwin_base_archive}-${darwin_arch}/${darwin_base_archive}"
-	    done # $darwin_arches
-            ## Okay now we've a bunch of thin objects, gotta fatten them up :)
-	    darwin_filelist=`find unfat-$$ -type f -name \*.o -print -o -name \*.lo -print | $SED -e "$basename" | sort -u`
-	    darwin_file=
-	    darwin_files=
-	    for darwin_file in $darwin_filelist; do
-	      darwin_files=`find unfat-$$ -name $darwin_file -print | sort | $NL2SP`
-	      $LIPO -create -output "$darwin_file" $darwin_files
-	    done # $darwin_filelist
-	    $RM -rf unfat-$$
-	    cd "$darwin_orig_dir"
-	  else
-	    cd $darwin_orig_dir
-	    func_extract_an_archive "$my_xdir" "$my_xabs"
-	  fi # $darwin_arches
-	} # !$opt_dry_run
-	;;
-      *)
-        func_extract_an_archive "$my_xdir" "$my_xabs"
-	;;
-      esac
-      my_oldobjs="$my_oldobjs "`find $my_xdir -name \*.$objext -print -o -name \*.lo -print | sort | $NL2SP`
-    done
-
-    func_extract_archives_result="$my_oldobjs"
-}
-
-
-# func_emit_wrapper [arg=no]
-#
-# Emit a libtool wrapper script on stdout.
-# Don't directly open a file because we may want to
-# incorporate the script contents within a cygwin/mingw
-# wrapper executable.  Must ONLY be called from within
-# func_mode_link because it depends on a number of variables
-# set therein.
-#
-# ARG is the value that the WRAPPER_SCRIPT_BELONGS_IN_OBJDIR
-# variable will take.  If 'yes', then the emitted script
-# will assume that the directory in which it is stored is
-# the $objdir directory.  This is a cygwin/mingw-specific
-# behavior.
-func_emit_wrapper ()
-{
-	func_emit_wrapper_arg1=${1-no}
-
-	$ECHO "\
-#! $SHELL
-
-# $output - temporary wrapper script for $objdir/$outputname
-# Generated by $PROGRAM (GNU $PACKAGE$TIMESTAMP) $VERSION
-#
-# The $output program cannot be directly executed until all the libtool
-# libraries that it depends on are installed.
-#
-# This wrapper script should never be moved out of the build directory.
-# If it is, it will not operate correctly.
-
-# Sed substitution that helps us do robust quoting.  It backslashifies
-# metacharacters that are still active within double-quoted strings.
-sed_quote_subst='$sed_quote_subst'
-
-# Be Bourne compatible
-if test -n \"\${ZSH_VERSION+set}\" && (emulate sh) >/dev/null 2>&1; then
-  emulate sh
-  NULLCMD=:
-  # Zsh 3.x and 4.x performs word splitting on \${1+\"\$@\"}, which
-  # is contrary to our usage.  Disable this feature.
-  alias -g '\${1+\"\$@\"}'='\"\$@\"'
-  setopt NO_GLOB_SUBST
-else
-  case \`(set -o) 2>/dev/null\` in *posix*) set -o posix;; esac
-fi
-BIN_SH=xpg4; export BIN_SH # for Tru64
-DUALCASE=1; export DUALCASE # for MKS sh
-
-# The HP-UX ksh and POSIX shell print the target directory to stdout
-# if CDPATH is set.
-(unset CDPATH) >/dev/null 2>&1 && unset CDPATH
-
-relink_command=\"$relink_command\"
-
-# This environment variable determines our operation mode.
-if test \"\$libtool_install_magic\" = \"$magic\"; then
-  # install mode needs the following variables:
-  generated_by_libtool_version='$macro_version'
-  notinst_deplibs='$notinst_deplibs'
-else
-  # When we are sourced in execute mode, \$file and \$ECHO are already set.
-  if test \"\$libtool_execute_magic\" != \"$magic\"; then
-    file=\"\$0\""
-
-    qECHO=`$ECHO "$ECHO" | $SED "$sed_quote_subst"`
-    $ECHO "\
-
-# A function that is used when there is no print builtin or printf.
-func_fallback_echo ()
-{
-  eval 'cat <<_LTECHO_EOF
-\$1
-_LTECHO_EOF'
-}
-    ECHO=\"$qECHO\"
-  fi
-
-# Very basic option parsing. These options are (a) specific to
-# the libtool wrapper, (b) are identical between the wrapper
-# /script/ and the wrapper /executable/ which is used only on
-# windows platforms, and (c) all begin with the string "--lt-"
-# (application programs are unlikely to have options which match
-# this pattern).
-#
-# There are only two supported options: --lt-debug and
-# --lt-dump-script. There is, deliberately, no --lt-help.
-#
-# The first argument to this parsing function should be the
-# script's $0 value, followed by "$@".
-lt_option_debug=
-func_parse_lt_options ()
-{
-  lt_script_arg0=\$0
-  shift
-  for lt_opt
-  do
-    case \"\$lt_opt\" in
-    --lt-debug) lt_option_debug=1 ;;
-    --lt-dump-script)
-        lt_dump_D=\`\$ECHO \"X\$lt_script_arg0\" | $SED -e 's/^X//' -e 's%/[^/]*$%%'\`
-        test \"X\$lt_dump_D\" = \"X\$lt_script_arg0\" && lt_dump_D=.
-        lt_dump_F=\`\$ECHO \"X\$lt_script_arg0\" | $SED -e 's/^X//' -e 's%^.*/%%'\`
-        cat \"\$lt_dump_D/\$lt_dump_F\"
-        exit 0
-      ;;
-    --lt-*)
-        \$ECHO \"Unrecognized --lt- option: '\$lt_opt'\" 1>&2
-        exit 1
-      ;;
-    esac
-  done
-
-  # Print the debug banner immediately:
-  if test -n \"\$lt_option_debug\"; then
-    echo \"${outputname}:${output}:\${LINENO}: libtool wrapper (GNU $PACKAGE$TIMESTAMP) $VERSION\" 1>&2
-  fi
-}
-
-# Used when --lt-debug. Prints its arguments to stdout
-# (redirection is the responsibility of the caller)
-func_lt_dump_args ()
-{
-  lt_dump_args_N=1;
-  for lt_arg
-  do
-    \$ECHO \"${outputname}:${output}:\${LINENO}: newargv[\$lt_dump_args_N]: \$lt_arg\"
-    lt_dump_args_N=\`expr \$lt_dump_args_N + 1\`
-  done
-}
-
-# Core function for launching the target application
-func_exec_program_core ()
-{
-"
-  case $host in
-  # Backslashes separate directories on plain windows
-  *-*-mingw | *-*-os2* | *-cegcc*)
-    $ECHO "\
-      if test -n \"\$lt_option_debug\"; then
-        \$ECHO \"${outputname}:${output}:\${LINENO}: newargv[0]: \$progdir\\\\\$program\" 1>&2
-        func_lt_dump_args \${1+\"\$@\"} 1>&2
-      fi
-      exec \"\$progdir\\\\\$program\" \${1+\"\$@\"}
-"
-    ;;
-
-  *)
-    $ECHO "\
-      if test -n \"\$lt_option_debug\"; then
-        \$ECHO \"${outputname}:${output}:\${LINENO}: newargv[0]: \$progdir/\$program\" 1>&2
-        func_lt_dump_args \${1+\"\$@\"} 1>&2
-      fi
-      exec \"\$progdir/\$program\" \${1+\"\$@\"}
-"
-    ;;
-  esac
-  $ECHO "\
-      \$ECHO \"\$0: cannot exec \$program \$*\" 1>&2
-      exit 1
-}
-
-# A function to encapsulate launching the target application
-# Strips options in the --lt-* namespace from \$@ and
-# launches target application with the remaining arguments.
-func_exec_program ()
-{
-  case \" \$* \" in
-  *\\ --lt-*)
-    for lt_wr_arg
-    do
-      case \$lt_wr_arg in
-      --lt-*) ;;
-      *) set x \"\$@\" \"\$lt_wr_arg\"; shift;;
-      esac
-      shift
-    done ;;
-  esac
-  func_exec_program_core \${1+\"\$@\"}
-}
-
-  # Parse options
-  func_parse_lt_options \"\$0\" \${1+\"\$@\"}
-
-  # Find the directory that this script lives in.
-  thisdir=\`\$ECHO \"\$file\" | $SED 's%/[^/]*$%%'\`
-  test \"x\$thisdir\" = \"x\$file\" && thisdir=.
-
-  # Follow symbolic links until we get to the real thisdir.
-  file=\`ls -ld \"\$file\" | $SED -n 's/.*-> //p'\`
-  while test -n \"\$file\"; do
-    destdir=\`\$ECHO \"\$file\" | $SED 's%/[^/]*\$%%'\`
-
-    # If there was a directory component, then change thisdir.
-    if test \"x\$destdir\" != \"x\$file\"; then
-      case \"\$destdir\" in
-      [\\\\/]* | [A-Za-z]:[\\\\/]*) thisdir=\"\$destdir\" ;;
-      *) thisdir=\"\$thisdir/\$destdir\" ;;
-      esac
-    fi
-
-    file=\`\$ECHO \"\$file\" | $SED 's%^.*/%%'\`
-    file=\`ls -ld \"\$thisdir/\$file\" | $SED -n 's/.*-> //p'\`
-  done
-
-  # Usually 'no', except on cygwin/mingw when embedded into
-  # the cwrapper.
-  WRAPPER_SCRIPT_BELONGS_IN_OBJDIR=$func_emit_wrapper_arg1
-  if test \"\$WRAPPER_SCRIPT_BELONGS_IN_OBJDIR\" = \"yes\"; then
-    # special case for '.'
-    if test \"\$thisdir\" = \".\"; then
-      thisdir=\`pwd\`
-    fi
-    # remove .libs from thisdir
-    case \"\$thisdir\" in
-    *[\\\\/]$objdir ) thisdir=\`\$ECHO \"\$thisdir\" | $SED 's%[\\\\/][^\\\\/]*$%%'\` ;;
-    $objdir )   thisdir=. ;;
-    esac
-  fi
-
-  # Try to get the absolute directory name.
-  absdir=\`cd \"\$thisdir\" && pwd\`
-  test -n \"\$absdir\" && thisdir=\"\$absdir\"
-"
-
-	if test "$fast_install" = yes; then
-	  $ECHO "\
-  program=lt-'$outputname'$exeext
-  progdir=\"\$thisdir/$objdir\"
-
-  if test ! -f \"\$progdir/\$program\" ||
-     { file=\`ls -1dt \"\$progdir/\$program\" \"\$progdir/../\$program\" 2>/dev/null | ${SED} 1q\`; \\
-       test \"X\$file\" != \"X\$progdir/\$program\"; }; then
-
-    file=\"\$\$-\$program\"
-
-    if test ! -d \"\$progdir\"; then
-      $MKDIR \"\$progdir\"
-    else
-      $RM \"\$progdir/\$file\"
-    fi"
-
-	  $ECHO "\
-
-    # relink executable if necessary
-    if test -n \"\$relink_command\"; then
-      if relink_command_output=\`eval \$relink_command 2>&1\`; then :
-      else
-	$ECHO \"\$relink_command_output\" >&2
-	$RM \"\$progdir/\$file\"
-	exit 1
-      fi
-    fi
-
-    $MV \"\$progdir/\$file\" \"\$progdir/\$program\" 2>/dev/null ||
-    { $RM \"\$progdir/\$program\";
-      $MV \"\$progdir/\$file\" \"\$progdir/\$program\"; }
-    $RM \"\$progdir/\$file\"
-  fi"
-	else
-	  $ECHO "\
-  program='$outputname'
-  progdir=\"\$thisdir/$objdir\"
-"
-	fi
-
-	$ECHO "\
-
-  if test -f \"\$progdir/\$program\"; then"
-
-	# fixup the dll searchpath if we need to.
-	#
-	# Fix the DLL searchpath if we need to.  Do this before prepending
-	# to shlibpath, because on Windows, both are PATH and uninstalled
-	# libraries must come first.
-	if test -n "$dllsearchpath"; then
-	  $ECHO "\
-    # Add the dll search path components to the executable PATH
-    PATH=$dllsearchpath:\$PATH
-"
-	fi
-
-	# Export our shlibpath_var if we have one.
-	if test "$shlibpath_overrides_runpath" = yes && test -n "$shlibpath_var" && test -n "$temp_rpath"; then
-	  $ECHO "\
-    # Add our own library path to $shlibpath_var
-    $shlibpath_var=\"$temp_rpath\$$shlibpath_var\"
-
-    # Some systems cannot cope with colon-terminated $shlibpath_var
-    # The second colon is a workaround for a bug in BeOS R4 sed
-    $shlibpath_var=\`\$ECHO \"\$$shlibpath_var\" | $SED 's/::*\$//'\`
-
-    export $shlibpath_var
-"
-	fi
-
-	$ECHO "\
-    if test \"\$libtool_execute_magic\" != \"$magic\"; then
-      # Run the actual program with our arguments.
-      func_exec_program \${1+\"\$@\"}
-    fi
-  else
-    # The program doesn't exist.
-    \$ECHO \"\$0: error: \\\`\$progdir/\$program' does not exist\" 1>&2
-    \$ECHO \"This script is just a wrapper for \$program.\" 1>&2
-    \$ECHO \"See the $PACKAGE documentation for more information.\" 1>&2
-    exit 1
-  fi
-fi\
-"
-}
-
-
-# func_emit_cwrapperexe_src
-# emit the source code for a wrapper executable on stdout
-# Must ONLY be called from within func_mode_link because
-# it depends on a number of variable set therein.
-func_emit_cwrapperexe_src ()
-{
-	cat <<EOF
-
-/* $cwrappersource - temporary wrapper executable for $objdir/$outputname
-   Generated by $PROGRAM (GNU $PACKAGE$TIMESTAMP) $VERSION
-
-   The $output program cannot be directly executed until all the libtool
-   libraries that it depends on are installed.
-
-   This wrapper executable should never be moved out of the build directory.
-   If it is, it will not operate correctly.
-*/
-EOF
-	    cat <<"EOF"
-#ifdef _MSC_VER
-# define _CRT_SECURE_NO_DEPRECATE 1
-#endif
-#include <stdio.h>
-#include <stdlib.h>
-#ifdef _MSC_VER
-# include <direct.h>
-# include <process.h>
-# include <io.h>
-#else
-# include <unistd.h>
-# include <stdint.h>
-# ifdef __CYGWIN__
-#  include <io.h>
-# endif
-#endif
-#include <malloc.h>
-#include <stdarg.h>
-#include <assert.h>
-#include <string.h>
-#include <ctype.h>
-#include <errno.h>
-#include <fcntl.h>
-#include <sys/stat.h>
-
-/* declarations of non-ANSI functions */
-#if defined(__MINGW32__)
-# ifdef __STRICT_ANSI__
-int _putenv (const char *);
-# endif
-#elif defined(__CYGWIN__)
-# ifdef __STRICT_ANSI__
-char *realpath (const char *, char *);
-int putenv (char *);
-int setenv (const char *, const char *, int);
-# endif
-/* #elif defined (other platforms) ... */
-#endif
-
-/* portability defines, excluding path handling macros */
-#if defined(_MSC_VER)
-# define setmode _setmode
-# define stat    _stat
-# define chmod   _chmod
-# define getcwd  _getcwd
-# define putenv  _putenv
-# define S_IXUSR _S_IEXEC
-# ifndef _INTPTR_T_DEFINED
-#  define _INTPTR_T_DEFINED
-#  define intptr_t int
-# endif
-#elif defined(__MINGW32__)
-# define setmode _setmode
-# define stat    _stat
-# define chmod   _chmod
-# define getcwd  _getcwd
-# define putenv  _putenv
-#elif defined(__CYGWIN__)
-# define HAVE_SETENV
-# define FOPEN_WB "wb"
-/* #elif defined (other platforms) ... */
-#endif
-
-#if defined(PATH_MAX)
-# define LT_PATHMAX PATH_MAX
-#elif defined(MAXPATHLEN)
-# define LT_PATHMAX MAXPATHLEN
-#else
-# define LT_PATHMAX 1024
-#endif
-
-#ifndef S_IXOTH
-# define S_IXOTH 0
-#endif
-#ifndef S_IXGRP
-# define S_IXGRP 0
-#endif
-
-/* path handling portability macros */
-#ifndef DIR_SEPARATOR
-# define DIR_SEPARATOR '/'
-# define PATH_SEPARATOR ':'
-#endif
-
-#if defined (_WIN32) || defined (__MSDOS__) || defined (__DJGPP__) || \
-  defined (__OS2__)
-# define HAVE_DOS_BASED_FILE_SYSTEM
-# define FOPEN_WB "wb"
-# ifndef DIR_SEPARATOR_2
-#  define DIR_SEPARATOR_2 '\\'
-# endif
-# ifndef PATH_SEPARATOR_2
-#  define PATH_SEPARATOR_2 ';'
-# endif
-#endif
-
-#ifndef DIR_SEPARATOR_2
-# define IS_DIR_SEPARATOR(ch) ((ch) == DIR_SEPARATOR)
-#else /* DIR_SEPARATOR_2 */
-# define IS_DIR_SEPARATOR(ch) \
-	(((ch) == DIR_SEPARATOR) || ((ch) == DIR_SEPARATOR_2))
-#endif /* DIR_SEPARATOR_2 */
-
-#ifndef PATH_SEPARATOR_2
-# define IS_PATH_SEPARATOR(ch) ((ch) == PATH_SEPARATOR)
-#else /* PATH_SEPARATOR_2 */
-# define IS_PATH_SEPARATOR(ch) ((ch) == PATH_SEPARATOR_2)
-#endif /* PATH_SEPARATOR_2 */
-
-#ifndef FOPEN_WB
-# define FOPEN_WB "w"
-#endif
-#ifndef _O_BINARY
-# define _O_BINARY 0
-#endif
-
-#define XMALLOC(type, num)      ((type *) xmalloc ((num) * sizeof(type)))
-#define XFREE(stale) do { \
-  if (stale) { free ((void *) stale); stale = 0; } \
-} while (0)
-
-#if defined(LT_DEBUGWRAPPER)
-static int lt_debug = 1;
-#else
-static int lt_debug = 0;
-#endif
-
-const char *program_name = "libtool-wrapper"; /* in case xstrdup fails */
-
-void *xmalloc (size_t num);
-char *xstrdup (const char *string);
-const char *base_name (const char *name);
-char *find_executable (const char *wrapper);
-char *chase_symlinks (const char *pathspec);
-int make_executable (const char *path);
-int check_executable (const char *path);
-char *strendzap (char *str, const char *pat);
-void lt_debugprintf (const char *file, int line, const char *fmt, ...);
-void lt_fatal (const char *file, int line, const char *message, ...);
-static const char *nonnull (const char *s);
-static const char *nonempty (const char *s);
-void lt_setenv (const char *name, const char *value);
-char *lt_extend_str (const char *orig_value, const char *add, int to_end);
-void lt_update_exe_path (const char *name, const char *value);
-void lt_update_lib_path (const char *name, const char *value);
-char **prepare_spawn (char **argv);
-void lt_dump_script (FILE *f);
-EOF
-
-	    cat <<EOF
-volatile const char * MAGIC_EXE = "$magic_exe";
-const char * LIB_PATH_VARNAME = "$shlibpath_var";
-EOF
-
-	    if test "$shlibpath_overrides_runpath" = yes && test -n "$shlibpath_var" && test -n "$temp_rpath"; then
-              func_to_host_path "$temp_rpath"
-	      cat <<EOF
-const char * LIB_PATH_VALUE   = "$func_to_host_path_result";
-EOF
-	    else
-	      cat <<"EOF"
-const char * LIB_PATH_VALUE   = "";
-EOF
-	    fi
-
-	    if test -n "$dllsearchpath"; then
-              func_to_host_path "$dllsearchpath:"
-	      cat <<EOF
-const char * EXE_PATH_VARNAME = "PATH";
-const char * EXE_PATH_VALUE   = "$func_to_host_path_result";
-EOF
-	    else
-	      cat <<"EOF"
-const char * EXE_PATH_VARNAME = "";
-const char * EXE_PATH_VALUE   = "";
-EOF
-	    fi
-
-	    if test "$fast_install" = yes; then
-	      cat <<EOF
-const char * TARGET_PROGRAM_NAME = "lt-$outputname"; /* hopefully, no .exe */
-EOF
-	    else
-	      cat <<EOF
-const char * TARGET_PROGRAM_NAME = "$outputname"; /* hopefully, no .exe */
-EOF
-	    fi
-
-
-	    cat <<"EOF"
-
-#define LTWRAPPER_OPTION_PREFIX         "--lt-"
-
-static const char *ltwrapper_option_prefix = LTWRAPPER_OPTION_PREFIX;
-static const char *dumpscript_opt       = LTWRAPPER_OPTION_PREFIX "dump-script";
-static const char *debug_opt            = LTWRAPPER_OPTION_PREFIX "debug";
-
-int
-main (int argc, char *argv[])
-{
-  char **newargz;
-  int  newargc;
-  char *tmp_pathspec;
-  char *actual_cwrapper_path;
-  char *actual_cwrapper_name;
-  char *target_name;
-  char *lt_argv_zero;
-  intptr_t rval = 127;
-
-  int i;
-
-  program_name = (char *) xstrdup (base_name (argv[0]));
-  newargz = XMALLOC (char *, argc + 1);
-
-  /* very simple arg parsing; don't want to rely on getopt
-   * also, copy all non cwrapper options to newargz, except
-   * argz[0], which is handled differently
-   */
-  newargc=0;
-  for (i = 1; i < argc; i++)
-    {
-      if (strcmp (argv[i], dumpscript_opt) == 0)
-	{
-EOF
-	    case "$host" in
-	      *mingw* | *cygwin* )
-		# make stdout use "unix" line endings
-		echo "          setmode(1,_O_BINARY);"
-		;;
-	      esac
-
-	    cat <<"EOF"
-	  lt_dump_script (stdout);
-	  return 0;
-	}
-      if (strcmp (argv[i], debug_opt) == 0)
-	{
-          lt_debug = 1;
-          continue;
-	}
-      if (strcmp (argv[i], ltwrapper_option_prefix) == 0)
-        {
-          /* however, if there is an option in the LTWRAPPER_OPTION_PREFIX
-             namespace, but it is not one of the ones we know about and
-             have already dealt with, above (inluding dump-script), then
-             report an error. Otherwise, targets might begin to believe
-             they are allowed to use options in the LTWRAPPER_OPTION_PREFIX
-             namespace. The first time any user complains about this, we'll
-             need to make LTWRAPPER_OPTION_PREFIX a configure-time option
-             or a configure.ac-settable value.
-           */
-          lt_fatal (__FILE__, __LINE__,
-		    "unrecognized %s option: '%s'",
-                    ltwrapper_option_prefix, argv[i]);
-        }
-      /* otherwise ... */
-      newargz[++newargc] = xstrdup (argv[i]);
-    }
-  newargz[++newargc] = NULL;
-
-EOF
-	    cat <<EOF
-  /* The GNU banner must be the first non-error debug message */
-  lt_debugprintf (__FILE__, __LINE__, "libtool wrapper (GNU $PACKAGE$TIMESTAMP) $VERSION\n");
-EOF
-	    cat <<"EOF"
-  lt_debugprintf (__FILE__, __LINE__, "(main) argv[0]: %s\n", argv[0]);
-  lt_debugprintf (__FILE__, __LINE__, "(main) program_name: %s\n", program_name);
-
-  tmp_pathspec = find_executable (argv[0]);
-  if (tmp_pathspec == NULL)
-    lt_fatal (__FILE__, __LINE__, "couldn't find %s", argv[0]);
-  lt_debugprintf (__FILE__, __LINE__,
-                  "(main) found exe (before symlink chase) at: %s\n",
-		  tmp_pathspec);
-
-  actual_cwrapper_path = chase_symlinks (tmp_pathspec);
-  lt_debugprintf (__FILE__, __LINE__,
-                  "(main) found exe (after symlink chase) at: %s\n",
-		  actual_cwrapper_path);
-  XFREE (tmp_pathspec);
-
-  actual_cwrapper_name = xstrdup (base_name (actual_cwrapper_path));
-  strendzap (actual_cwrapper_path, actual_cwrapper_name);
-
-  /* wrapper name transforms */
-  strendzap (actual_cwrapper_name, ".exe");
-  tmp_pathspec = lt_extend_str (actual_cwrapper_name, ".exe", 1);
-  XFREE (actual_cwrapper_name);
-  actual_cwrapper_name = tmp_pathspec;
-  tmp_pathspec = 0;
-
-  /* target_name transforms -- use actual target program name; might have lt- prefix */
-  target_name = xstrdup (base_name (TARGET_PROGRAM_NAME));
-  strendzap (target_name, ".exe");
-  tmp_pathspec = lt_extend_str (target_name, ".exe", 1);
-  XFREE (target_name);
-  target_name = tmp_pathspec;
-  tmp_pathspec = 0;
-
-  lt_debugprintf (__FILE__, __LINE__,
-		  "(main) libtool target name: %s\n",
-		  target_name);
-EOF
-
-	    cat <<EOF
-  newargz[0] =
-    XMALLOC (char, (strlen (actual_cwrapper_path) +
-		    strlen ("$objdir") + 1 + strlen (actual_cwrapper_name) + 1));
-  strcpy (newargz[0], actual_cwrapper_path);
-  strcat (newargz[0], "$objdir");
-  strcat (newargz[0], "/");
-EOF
-
-	    cat <<"EOF"
-  /* stop here, and copy so we don't have to do this twice */
-  tmp_pathspec = xstrdup (newargz[0]);
-
-  /* do NOT want the lt- prefix here, so use actual_cwrapper_name */
-  strcat (newargz[0], actual_cwrapper_name);
-
-  /* DO want the lt- prefix here if it exists, so use target_name */
-  lt_argv_zero = lt_extend_str (tmp_pathspec, target_name, 1);
-  XFREE (tmp_pathspec);
-  tmp_pathspec = NULL;
-EOF
-
-	    case $host_os in
-	      mingw*)
-	    cat <<"EOF"
-  {
-    char* p;
-    while ((p = strchr (newargz[0], '\\')) != NULL)
-      {
-	*p = '/';
-      }
-    while ((p = strchr (lt_argv_zero, '\\')) != NULL)
-      {
-	*p = '/';
-      }
-  }
-EOF
-	    ;;
-	    esac
-
-	    cat <<"EOF"
-  XFREE (target_name);
-  XFREE (actual_cwrapper_path);
-  XFREE (actual_cwrapper_name);
-
-  lt_setenv ("BIN_SH", "xpg4"); /* for Tru64 */
-  lt_setenv ("DUALCASE", "1");  /* for MSK sh */
-  /* Update the DLL searchpath.  EXE_PATH_VALUE ($dllsearchpath) must
-     be prepended before (that is, appear after) LIB_PATH_VALUE ($temp_rpath)
-     because on Windows, both *_VARNAMEs are PATH but uninstalled
-     libraries must come first. */
-  lt_update_exe_path (EXE_PATH_VARNAME, EXE_PATH_VALUE);
-  lt_update_lib_path (LIB_PATH_VARNAME, LIB_PATH_VALUE);
-
-  lt_debugprintf (__FILE__, __LINE__, "(main) lt_argv_zero: %s\n",
-		  nonnull (lt_argv_zero));
-  for (i = 0; i < newargc; i++)
-    {
-      lt_debugprintf (__FILE__, __LINE__, "(main) newargz[%d]: %s\n",
-		      i, nonnull (newargz[i]));
-    }
-
-EOF
-
-	    case $host_os in
-	      mingw*)
-		cat <<"EOF"
-  /* execv doesn't actually work on mingw as expected on unix */
-  newargz = prepare_spawn (newargz);
-  rval = _spawnv (_P_WAIT, lt_argv_zero, (const char * const *) newargz);
-  if (rval == -1)
-    {
-      /* failed to start process */
-      lt_debugprintf (__FILE__, __LINE__,
-		      "(main) failed to launch target \"%s\": %s\n",
-		      lt_argv_zero, nonnull (strerror (errno)));
-      return 127;
-    }
-  return rval;
-EOF
-		;;
-	      *)
-		cat <<"EOF"
-  execv (lt_argv_zero, newargz);
-  return rval; /* =127, but avoids unused variable warning */
-EOF
-		;;
-	    esac
-
-	    cat <<"EOF"
-}
-
-void *
-xmalloc (size_t num)
-{
-  void *p = (void *) malloc (num);
-  if (!p)
-    lt_fatal (__FILE__, __LINE__, "memory exhausted");
-
-  return p;
-}
-
-char *
-xstrdup (const char *string)
-{
-  return string ? strcpy ((char *) xmalloc (strlen (string) + 1),
-			  string) : NULL;
-}
-
-const char *
-base_name (const char *name)
-{
-  const char *base;
-
-#if defined (HAVE_DOS_BASED_FILE_SYSTEM)
-  /* Skip over the disk name in MSDOS pathnames. */
-  if (isalpha ((unsigned char) name[0]) && name[1] == ':')
-    name += 2;
-#endif
-
-  for (base = name; *name; name++)
-    if (IS_DIR_SEPARATOR (*name))
-      base = name + 1;
-  return base;
-}
-
-int
-check_executable (const char *path)
-{
-  struct stat st;
-
-  lt_debugprintf (__FILE__, __LINE__, "(check_executable): %s\n",
-                  nonempty (path));
-  if ((!path) || (!*path))
-    return 0;
-
-  if ((stat (path, &st) >= 0)
-      && (st.st_mode & (S_IXUSR | S_IXGRP | S_IXOTH)))
-    return 1;
-  else
-    return 0;
-}
-
-int
-make_executable (const char *path)
-{
-  int rval = 0;
-  struct stat st;
-
-  lt_debugprintf (__FILE__, __LINE__, "(make_executable): %s\n",
-                  nonempty (path));
-  if ((!path) || (!*path))
-    return 0;
-
-  if (stat (path, &st) >= 0)
-    {
-      rval = chmod (path, st.st_mode | S_IXOTH | S_IXGRP | S_IXUSR);
-    }
-  return rval;
-}
-
-/* Searches for the full path of the wrapper.  Returns
-   newly allocated full path name if found, NULL otherwise
-   Does not chase symlinks, even on platforms that support them.
-*/
-char *
-find_executable (const char *wrapper)
-{
-  int has_slash = 0;
-  const char *p;
-  const char *p_next;
-  /* static buffer for getcwd */
-  char tmp[LT_PATHMAX + 1];
-  int tmp_len;
-  char *concat_name;
-
-  lt_debugprintf (__FILE__, __LINE__, "(find_executable): %s\n",
-                  nonempty (wrapper));
-
-  if ((wrapper == NULL) || (*wrapper == '\0'))
-    return NULL;
-
-  /* Absolute path? */
-#if defined (HAVE_DOS_BASED_FILE_SYSTEM)
-  if (isalpha ((unsigned char) wrapper[0]) && wrapper[1] == ':')
-    {
-      concat_name = xstrdup (wrapper);
-      if (check_executable (concat_name))
-	return concat_name;
-      XFREE (concat_name);
-    }
-  else
-    {
-#endif
-      if (IS_DIR_SEPARATOR (wrapper[0]))
-	{
-	  concat_name = xstrdup (wrapper);
-	  if (check_executable (concat_name))
-	    return concat_name;
-	  XFREE (concat_name);
-	}
-#if defined (HAVE_DOS_BASED_FILE_SYSTEM)
-    }
-#endif
-
-  for (p = wrapper; *p; p++)
-    if (*p == '/')
-      {
-	has_slash = 1;
-	break;
-      }
-  if (!has_slash)
-    {
-      /* no slashes; search PATH */
-      const char *path = getenv ("PATH");
-      if (path != NULL)
-	{
-	  for (p = path; *p; p = p_next)
-	    {
-	      const char *q;
-	      size_t p_len;
-	      for (q = p; *q; q++)
-		if (IS_PATH_SEPARATOR (*q))
-		  break;
-	      p_len = q - p;
-	      p_next = (*q == '\0' ? q : q + 1);
-	      if (p_len == 0)
-		{
-		  /* empty path: current directory */
-		  if (getcwd (tmp, LT_PATHMAX) == NULL)
-		    lt_fatal (__FILE__, __LINE__, "getcwd failed: %s",
-                              nonnull (strerror (errno)));
-		  tmp_len = strlen (tmp);
-		  concat_name =
-		    XMALLOC (char, tmp_len + 1 + strlen (wrapper) + 1);
-		  memcpy (concat_name, tmp, tmp_len);
-		  concat_name[tmp_len] = '/';
-		  strcpy (concat_name + tmp_len + 1, wrapper);
-		}
-	      else
-		{
-		  concat_name =
-		    XMALLOC (char, p_len + 1 + strlen (wrapper) + 1);
-		  memcpy (concat_name, p, p_len);
-		  concat_name[p_len] = '/';
-		  strcpy (concat_name + p_len + 1, wrapper);
-		}
-	      if (check_executable (concat_name))
-		return concat_name;
-	      XFREE (concat_name);
-	    }
-	}
-      /* not found in PATH; assume curdir */
-    }
-  /* Relative path | not found in path: prepend cwd */
-  if (getcwd (tmp, LT_PATHMAX) == NULL)
-    lt_fatal (__FILE__, __LINE__, "getcwd failed: %s",
-              nonnull (strerror (errno)));
-  tmp_len = strlen (tmp);
-  concat_name = XMALLOC (char, tmp_len + 1 + strlen (wrapper) + 1);
-  memcpy (concat_name, tmp, tmp_len);
-  concat_name[tmp_len] = '/';
-  strcpy (concat_name + tmp_len + 1, wrapper);
-
-  if (check_executable (concat_name))
-    return concat_name;
-  XFREE (concat_name);
-  return NULL;
-}
-
-char *
-chase_symlinks (const char *pathspec)
-{
-#ifndef S_ISLNK
-  return xstrdup (pathspec);
-#else
-  char buf[LT_PATHMAX];
-  struct stat s;
-  char *tmp_pathspec = xstrdup (pathspec);
-  char *p;
-  int has_symlinks = 0;
-  while (strlen (tmp_pathspec) && !has_symlinks)
-    {
-      lt_debugprintf (__FILE__, __LINE__,
-		      "checking path component for symlinks: %s\n",
-		      tmp_pathspec);
-      if (lstat (tmp_pathspec, &s) == 0)
-	{
-	  if (S_ISLNK (s.st_mode) != 0)
-	    {
-	      has_symlinks = 1;
-	      break;
-	    }
-
-	  /* search backwards for last DIR_SEPARATOR */
-	  p = tmp_pathspec + strlen (tmp_pathspec) - 1;
-	  while ((p > tmp_pathspec) && (!IS_DIR_SEPARATOR (*p)))
-	    p--;
-	  if ((p == tmp_pathspec) && (!IS_DIR_SEPARATOR (*p)))
-	    {
-	      /* no more DIR_SEPARATORS left */
-	      break;
-	    }
-	  *p = '\0';
-	}
-      else
-	{
-	  lt_fatal (__FILE__, __LINE__,
-		    "error accessing file \"%s\": %s",
-		    tmp_pathspec, nonnull (strerror (errno)));
-	}
-    }
-  XFREE (tmp_pathspec);
-
-  if (!has_symlinks)
-    {
-      return xstrdup (pathspec);
-    }
-
-  tmp_pathspec = realpath (pathspec, buf);
-  if (tmp_pathspec == 0)
-    {
-      lt_fatal (__FILE__, __LINE__,
-		"could not follow symlinks for %s", pathspec);
-    }
-  return xstrdup (tmp_pathspec);
-#endif
-}
-
-char *
-strendzap (char *str, const char *pat)
-{
-  size_t len, patlen;
-
-  assert (str != NULL);
-  assert (pat != NULL);
-
-  len = strlen (str);
-  patlen = strlen (pat);
-
-  if (patlen <= len)
-    {
-      str += len - patlen;
-      if (strcmp (str, pat) == 0)
-	*str = '\0';
-    }
-  return str;
-}
-
-void
-lt_debugprintf (const char *file, int line, const char *fmt, ...)
-{
-  va_list args;
-  if (lt_debug)
-    {
-      (void) fprintf (stderr, "%s:%s:%d: ", program_name, file, line);
-      va_start (args, fmt);
-      (void) vfprintf (stderr, fmt, args);
-      va_end (args);
-    }
-}
-
-static void
-lt_error_core (int exit_status, const char *file,
-	       int line, const char *mode,
-	       const char *message, va_list ap)
-{
-  fprintf (stderr, "%s:%s:%d: %s: ", program_name, file, line, mode);
-  vfprintf (stderr, message, ap);
-  fprintf (stderr, ".\n");
-
-  if (exit_status >= 0)
-    exit (exit_status);
-}
-
-void
-lt_fatal (const char *file, int line, const char *message, ...)
-{
-  va_list ap;
-  va_start (ap, message);
-  lt_error_core (EXIT_FAILURE, file, line, "FATAL", message, ap);
-  va_end (ap);
-}
-
-static const char *
-nonnull (const char *s)
-{
-  return s ? s : "(null)";
-}
-
-static const char *
-nonempty (const char *s)
-{
-  return (s && !*s) ? "(empty)" : nonnull (s);
-}
-
-void
-lt_setenv (const char *name, const char *value)
-{
-  lt_debugprintf (__FILE__, __LINE__,
-		  "(lt_setenv) setting '%s' to '%s'\n",
-                  nonnull (name), nonnull (value));
-  {
-#ifdef HAVE_SETENV
-    /* always make a copy, for consistency with !HAVE_SETENV */
-    char *str = xstrdup (value);
-    setenv (name, str, 1);
-#else
-    int len = strlen (name) + 1 + strlen (value) + 1;
-    char *str = XMALLOC (char, len);
-    sprintf (str, "%s=%s", name, value);
-    if (putenv (str) != EXIT_SUCCESS)
-      {
-        XFREE (str);
-      }
-#endif
-  }
-}
-
-char *
-lt_extend_str (const char *orig_value, const char *add, int to_end)
-{
-  char *new_value;
-  if (orig_value && *orig_value)
-    {
-      int orig_value_len = strlen (orig_value);
-      int add_len = strlen (add);
-      new_value = XMALLOC (char, add_len + orig_value_len + 1);
-      if (to_end)
-        {
-          strcpy (new_value, orig_value);
-          strcpy (new_value + orig_value_len, add);
-        }
-      else
-        {
-          strcpy (new_value, add);
-          strcpy (new_value + add_len, orig_value);
-        }
-    }
-  else
-    {
-      new_value = xstrdup (add);
-    }
-  return new_value;
-}
-
-void
-lt_update_exe_path (const char *name, const char *value)
-{
-  lt_debugprintf (__FILE__, __LINE__,
-		  "(lt_update_exe_path) modifying '%s' by prepending '%s'\n",
-                  nonnull (name), nonnull (value));
-
-  if (name && *name && value && *value)
-    {
-      char *new_value = lt_extend_str (getenv (name), value, 0);
-      /* some systems can't cope with a ':'-terminated path #' */
-      int len = strlen (new_value);
-      while (((len = strlen (new_value)) > 0) && IS_PATH_SEPARATOR (new_value[len-1]))
-        {
-          new_value[len-1] = '\0';
-        }
-      lt_setenv (name, new_value);
-      XFREE (new_value);
-    }
-}
-
-void
-lt_update_lib_path (const char *name, const char *value)
-{
-  lt_debugprintf (__FILE__, __LINE__,
-		  "(lt_update_lib_path) modifying '%s' by prepending '%s'\n",
-                  nonnull (name), nonnull (value));
-
-  if (name && *name && value && *value)
-    {
-      char *new_value = lt_extend_str (getenv (name), value, 0);
-      lt_setenv (name, new_value);
-      XFREE (new_value);
-    }
-}
-
-EOF
-	    case $host_os in
-	      mingw*)
-		cat <<"EOF"
-
-/* Prepares an argument vector before calling spawn().
-   Note that spawn() does not by itself call the command interpreter
-     (getenv ("COMSPEC") != NULL ? getenv ("COMSPEC") :
-      ({ OSVERSIONINFO v; v.dwOSVersionInfoSize = sizeof(OSVERSIONINFO);
-         GetVersionEx(&v);
-         v.dwPlatformId == VER_PLATFORM_WIN32_NT;
-      }) ? "cmd.exe" : "command.com").
-   Instead it simply concatenates the arguments, separated by ' ', and calls
-   CreateProcess().  We must quote the arguments since Win32 CreateProcess()
-   interprets characters like ' ', '\t', '\\', '"' (but not '<' and '>') in a
-   special way:
-   - Space and tab are interpreted as delimiters. They are not treated as
-     delimiters if they are surrounded by double quotes: "...".
-   - Unescaped double quotes are removed from the input. Their only effect is
-     that within double quotes, space and tab are treated like normal
-     characters.
-   - Backslashes not followed by double quotes are not special.
-   - But 2*n+1 backslashes followed by a double quote become
-     n backslashes followed by a double quote (n >= 0):
-       \" -> "
-       \\\" -> \"
-       \\\\\" -> \\"
- */
-#define SHELL_SPECIAL_CHARS "\"\\ \001\002\003\004\005\006\007\010\011\012\013\014\015\016\017\020\021\022\023\024\025\026\027\030\031\032\033\034\035\036\037"
-#define SHELL_SPACE_CHARS " \001\002\003\004\005\006\007\010\011\012\013\014\015\016\017\020\021\022\023\024\025\026\027\030\031\032\033\034\035\036\037"
-char **
-prepare_spawn (char **argv)
-{
-  size_t argc;
-  char **new_argv;
-  size_t i;
-
-  /* Count number of arguments.  */
-  for (argc = 0; argv[argc] != NULL; argc++)
-    ;
-
-  /* Allocate new argument vector.  */
-  new_argv = XMALLOC (char *, argc + 1);
-
-  /* Put quoted arguments into the new argument vector.  */
-  for (i = 0; i < argc; i++)
-    {
-      const char *string = argv[i];
-
-      if (string[0] == '\0')
-	new_argv[i] = xstrdup ("\"\"");
-      else if (strpbrk (string, SHELL_SPECIAL_CHARS) != NULL)
-	{
-	  int quote_around = (strpbrk (string, SHELL_SPACE_CHARS) != NULL);
-	  size_t length;
-	  unsigned int backslashes;
-	  const char *s;
-	  char *quoted_string;
-	  char *p;
-
-	  length = 0;
-	  backslashes = 0;
-	  if (quote_around)
-	    length++;
-	  for (s = string; *s != '\0'; s++)
-	    {
-	      char c = *s;
-	      if (c == '"')
-		length += backslashes + 1;
-	      length++;
-	      if (c == '\\')
-		backslashes++;
-	      else
-		backslashes = 0;
-	    }
-	  if (quote_around)
-	    length += backslashes + 1;
-
-	  quoted_string = XMALLOC (char, length + 1);
-
-	  p = quoted_string;
-	  backslashes = 0;
-	  if (quote_around)
-	    *p++ = '"';
-	  for (s = string; *s != '\0'; s++)
-	    {
-	      char c = *s;
-	      if (c == '"')
-		{
-		  unsigned int j;
-		  for (j = backslashes + 1; j > 0; j--)
-		    *p++ = '\\';
-		}
-	      *p++ = c;
-	      if (c == '\\')
-		backslashes++;
-	      else
-		backslashes = 0;
-	    }
-	  if (quote_around)
-	    {
-	      unsigned int j;
-	      for (j = backslashes; j > 0; j--)
-		*p++ = '\\';
-	      *p++ = '"';
-	    }
-	  *p = '\0';
-
-	  new_argv[i] = quoted_string;
-	}
-      else
-	new_argv[i] = (char *) string;
-    }
-  new_argv[argc] = NULL;
-
-  return new_argv;
-}
-EOF
-		;;
-	    esac
-
-            cat <<"EOF"
-void lt_dump_script (FILE* f)
-{
-EOF
-	    func_emit_wrapper yes |
-	      $SED -n -e '
-s/^\(.\{79\}\)\(..*\)/\1\
-\2/
-h
-s/\([\\"]\)/\\\1/g
-s/$/\\n/
-s/\([^\n]*\).*/  fputs ("\1", f);/p
-g
-D'
-            cat <<"EOF"
-}
-EOF
-}
-# end: func_emit_cwrapperexe_src
-
-# func_win32_import_lib_p ARG
-# True if ARG is an import lib, as indicated by $file_magic_cmd
-func_win32_import_lib_p ()
-{
-    $opt_debug
-    case `eval $file_magic_cmd \"\$1\" 2>/dev/null | $SED -e 10q` in
-    *import*) : ;;
-    *) false ;;
-    esac
-}
-
-# func_mode_link arg...
-func_mode_link ()
-{
-    $opt_debug
-    case $host in
-    *-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-os2* | *-cegcc*)
-      # It is impossible to link a dll without this setting, and
-      # we shouldn't force the makefile maintainer to figure out
-      # which system we are compiling for in order to pass an extra
-      # flag for every libtool invocation.
-      # allow_undefined=no
-
-      # FIXME: Unfortunately, there are problems with the above when trying
-      # to make a dll which has undefined symbols, in which case not
-      # even a static library is built.  For now, we need to specify
-      # -no-undefined on the libtool link line when we can be certain
-      # that all symbols are satisfied, otherwise we get a static library.
-      allow_undefined=yes
-      ;;
-    *)
-      allow_undefined=yes
-      ;;
-    esac
-    libtool_args=$nonopt
-    base_compile="$nonopt $@"
-    compile_command=$nonopt
-    finalize_command=$nonopt
-
-    compile_rpath=
-    finalize_rpath=
-    compile_shlibpath=
-    finalize_shlibpath=
-    convenience=
-    old_convenience=
-    deplibs=
-    old_deplibs=
-    compiler_flags=
-    linker_flags=
-    dllsearchpath=
-    lib_search_path=`pwd`
-    inst_prefix_dir=
-    new_inherited_linker_flags=
-
-    avoid_version=no
-    bindir=
-    dlfiles=
-    dlprefiles=
-    dlself=no
-    export_dynamic=no
-    export_symbols=
-    export_symbols_regex=
-    generated=
-    libobjs=
-    ltlibs=
-    module=no
-    no_install=no
-    objs=
-    non_pic_objects=
-    precious_files_regex=
-    prefer_static_libs=no
-    preload=no
-    prev=
-    prevarg=
-    release=
-    rpath=
-    xrpath=
-    perm_rpath=
-    temp_rpath=
-    thread_safe=no
-    vinfo=
-    vinfo_number=no
-    weak_libs=
-    single_module="${wl}-single_module"
-    func_infer_tag $base_compile
-
-    # We need to know -static, to get the right output filenames.
-    for arg
-    do
-      case $arg in
-      -shared)
-	test "$build_libtool_libs" != yes && \
-	  func_fatal_configuration "can not build a shared library"
-	build_old_libs=no
-	break
-	;;
-      -all-static | -static | -static-libtool-libs)
-	case $arg in
-	-all-static)
-	  if test "$build_libtool_libs" = yes && test -z "$link_static_flag"; then
-	    func_warning "complete static linking is impossible in this configuration"
-	  fi
-	  if test -n "$link_static_flag"; then
-	    dlopen_self=$dlopen_self_static
-	  fi
-	  prefer_static_libs=yes
-	  ;;
-	-static)
-	  if test -z "$pic_flag" && test -n "$link_static_flag"; then
-	    dlopen_self=$dlopen_self_static
-	  fi
-	  prefer_static_libs=built
-	  ;;
-	-static-libtool-libs)
-	  if test -z "$pic_flag" && test -n "$link_static_flag"; then
-	    dlopen_self=$dlopen_self_static
-	  fi
-	  prefer_static_libs=yes
-	  ;;
-	esac
-	build_libtool_libs=no
-	build_old_libs=yes
-	break
-	;;
-      esac
-    done
-
-    # See if our shared archives depend on static archives.
-    test -n "$old_archive_from_new_cmds" && build_old_libs=yes
-
-    # Go through the arguments, transforming them on the way.
-    while test "$#" -gt 0; do
-      arg="$1"
-      shift
-      func_quote_for_eval "$arg"
-      qarg=$func_quote_for_eval_unquoted_result
-      func_append libtool_args " $func_quote_for_eval_result"
-
-      # If the previous option needs an argument, assign it.
-      if test -n "$prev"; then
-	case $prev in
-	output)
-	  func_append compile_command " @OUTPUT@"
-	  func_append finalize_command " @OUTPUT@"
-	  ;;
-	esac
-
-	case $prev in
-	bindir)
-	  bindir="$arg"
-	  prev=
-	  continue
-	  ;;
-	dlfiles|dlprefiles)
-	  if test "$preload" = no; then
-	    # Add the symbol object into the linking commands.
-	    func_append compile_command " @SYMFILE@"
-	    func_append finalize_command " @SYMFILE@"
-	    preload=yes
-	  fi
-	  case $arg in
-	  *.la | *.lo) ;;  # We handle these cases below.
-	  force)
-	    if test "$dlself" = no; then
-	      dlself=needless
-	      export_dynamic=yes
-	    fi
-	    prev=
-	    continue
-	    ;;
-	  self)
-	    if test "$prev" = dlprefiles; then
-	      dlself=yes
-	    elif test "$prev" = dlfiles && test "$dlopen_self" != yes; then
-	      dlself=yes
-	    else
-	      dlself=needless
-	      export_dynamic=yes
-	    fi
-	    prev=
-	    continue
-	    ;;
-	  *)
-	    if test "$prev" = dlfiles; then
-	      func_append dlfiles " $arg"
-	    else
-	      func_append dlprefiles " $arg"
-	    fi
-	    prev=
-	    continue
-	    ;;
-	  esac
-	  ;;
-	expsyms)
-	  export_symbols="$arg"
-	  test -f "$arg" \
-	    || func_fatal_error "symbol file \`$arg' does not exist"
-	  prev=
-	  continue
-	  ;;
-	expsyms_regex)
-	  export_symbols_regex="$arg"
-	  prev=
-	  continue
-	  ;;
-	framework)
-	  case $host in
-	    *-*-darwin*)
-	      case "$deplibs " in
-		*" $qarg.ltframework "*) ;;
-		*) func_append deplibs " $qarg.ltframework" # this is fixed later
-		   ;;
-	      esac
-	      ;;
-	  esac
-	  prev=
-	  continue
-	  ;;
-	inst_prefix)
-	  inst_prefix_dir="$arg"
-	  prev=
-	  continue
-	  ;;
-	objectlist)
-	  if test -f "$arg"; then
-	    save_arg=$arg
-	    moreargs=
-	    for fil in `cat "$save_arg"`
-	    do
-#	      func_append moreargs " $fil"
-	      arg=$fil
-	      # A libtool-controlled object.
-
-	      # Check to see that this really is a libtool object.
-	      if func_lalib_unsafe_p "$arg"; then
-		pic_object=
-		non_pic_object=
-
-		# Read the .lo file
-		func_source "$arg"
-
-		if test -z "$pic_object" ||
-		   test -z "$non_pic_object" ||
-		   test "$pic_object" = none &&
-		   test "$non_pic_object" = none; then
-		  func_fatal_error "cannot find name of object for \`$arg'"
-		fi
-
-		# Extract subdirectory from the argument.
-		func_dirname "$arg" "/" ""
-		xdir="$func_dirname_result"
-
-		if test "$pic_object" != none; then
-		  # Prepend the subdirectory the object is found in.
-		  pic_object="$xdir$pic_object"
-
-		  if test "$prev" = dlfiles; then
-		    if test "$build_libtool_libs" = yes && test "$dlopen_support" = yes; then
-		      func_append dlfiles " $pic_object"
-		      prev=
-		      continue
-		    else
-		      # If libtool objects are unsupported, then we need to preload.
-		      prev=dlprefiles
-		    fi
-		  fi
-
-		  # CHECK ME:  I think I busted this.  -Ossama
-		  if test "$prev" = dlprefiles; then
-		    # Preload the old-style object.
-		    func_append dlprefiles " $pic_object"
-		    prev=
-		  fi
-
-		  # A PIC object.
-		  func_append libobjs " $pic_object"
-		  arg="$pic_object"
-		fi
-
-		# Non-PIC object.
-		if test "$non_pic_object" != none; then
-		  # Prepend the subdirectory the object is found in.
-		  non_pic_object="$xdir$non_pic_object"
-
-		  # A standard non-PIC object
-		  func_append non_pic_objects " $non_pic_object"
-		  if test -z "$pic_object" || test "$pic_object" = none ; then
-		    arg="$non_pic_object"
-		  fi
-		else
-		  # If the PIC object exists, use it instead.
-		  # $xdir was prepended to $pic_object above.
-		  non_pic_object="$pic_object"
-		  func_append non_pic_objects " $non_pic_object"
-		fi
-	      else
-		# Only an error if not doing a dry-run.
-		if $opt_dry_run; then
-		  # Extract subdirectory from the argument.
-		  func_dirname "$arg" "/" ""
-		  xdir="$func_dirname_result"
-
-		  func_lo2o "$arg"
-		  pic_object=$xdir$objdir/$func_lo2o_result
-		  non_pic_object=$xdir$func_lo2o_result
-		  func_append libobjs " $pic_object"
-		  func_append non_pic_objects " $non_pic_object"
-	        else
-		  func_fatal_error "\`$arg' is not a valid libtool object"
-		fi
-	      fi
-	    done
-	  else
-	    func_fatal_error "link input file \`$arg' does not exist"
-	  fi
-	  arg=$save_arg
-	  prev=
-	  continue
-	  ;;
-	precious_regex)
-	  precious_files_regex="$arg"
-	  prev=
-	  continue
-	  ;;
-	release)
-	  release="-$arg"
-	  prev=
-	  continue
-	  ;;
-	rpath | xrpath)
-	  # We need an absolute path.
-	  case $arg in
-	  [\\/]* | [A-Za-z]:[\\/]*) ;;
-	  *)
-	    func_fatal_error "only absolute run-paths are allowed"
-	    ;;
-	  esac
-	  if test "$prev" = rpath; then
-	    case "$rpath " in
-	    *" $arg "*) ;;
-	    *) func_append rpath " $arg" ;;
-	    esac
-	  else
-	    case "$xrpath " in
-	    *" $arg "*) ;;
-	    *) func_append xrpath " $arg" ;;
-	    esac
-	  fi
-	  prev=
-	  continue
-	  ;;
-	shrext)
-	  shrext_cmds="$arg"
-	  prev=
-	  continue
-	  ;;
-	weak)
-	  func_append weak_libs " $arg"
-	  prev=
-	  continue
-	  ;;
-	xcclinker)
-	  func_append linker_flags " $qarg"
-	  func_append compiler_flags " $qarg"
-	  prev=
-	  func_append compile_command " $qarg"
-	  func_append finalize_command " $qarg"
-	  continue
-	  ;;
-	xcompiler)
-	  func_append compiler_flags " $qarg"
-	  prev=
-	  func_append compile_command " $qarg"
-	  func_append finalize_command " $qarg"
-	  continue
-	  ;;
-	xlinker)
-	  func_append linker_flags " $qarg"
-	  func_append compiler_flags " $wl$qarg"
-	  prev=
-	  func_append compile_command " $wl$qarg"
-	  func_append finalize_command " $wl$qarg"
-	  continue
-	  ;;
-	*)
-	  eval "$prev=\"\$arg\""
-	  prev=
-	  continue
-	  ;;
-	esac
-      fi # test -n "$prev"
-
-      prevarg="$arg"
-
-      case $arg in
-      -all-static)
-	if test -n "$link_static_flag"; then
-	  # See comment for -static flag below, for more details.
-	  func_append compile_command " $link_static_flag"
-	  func_append finalize_command " $link_static_flag"
-	fi
-	continue
-	;;
-
-      -allow-undefined)
-	# FIXME: remove this flag sometime in the future.
-	func_fatal_error "\`-allow-undefined' must not be used because it is the default"
-	;;
-
-      -avoid-version)
-	avoid_version=yes
-	continue
-	;;
-
-      -bindir)
-	prev=bindir
-	continue
-	;;
-
-      -dlopen)
-	prev=dlfiles
-	continue
-	;;
-
-      -dlpreopen)
-	prev=dlprefiles
-	continue
-	;;
-
-      -export-dynamic)
-	export_dynamic=yes
-	continue
-	;;
-
-      -export-symbols | -export-symbols-regex)
-	if test -n "$export_symbols" || test -n "$export_symbols_regex"; then
-	  func_fatal_error "more than one -exported-symbols argument is not allowed"
-	fi
-	if test "X$arg" = "X-export-symbols"; then
-	  prev=expsyms
-	else
-	  prev=expsyms_regex
-	fi
-	continue
-	;;
-
-      -framework)
-	prev=framework
-	continue
-	;;
-
-      -inst-prefix-dir)
-	prev=inst_prefix
-	continue
-	;;
-
-      # The native IRIX linker understands -LANG:*, -LIST:* and -LNO:*
-      # so, if we see these flags be careful not to treat them like -L
-      -L[A-Z][A-Z]*:*)
-	case $with_gcc/$host in
-	no/*-*-irix* | /*-*-irix*)
-	  func_append compile_command " $arg"
-	  func_append finalize_command " $arg"
-	  ;;
-	esac
-	continue
-	;;
-
-      -L*)
-	func_stripname "-L" '' "$arg"
-	if test -z "$func_stripname_result"; then
-	  if test "$#" -gt 0; then
-	    func_fatal_error "require no space between \`-L' and \`$1'"
-	  else
-	    func_fatal_error "need path for \`-L' option"
-	  fi
-	fi
-	func_resolve_sysroot "$func_stripname_result"
-	dir=$func_resolve_sysroot_result
-	# We need an absolute path.
-	case $dir in
-	[\\/]* | [A-Za-z]:[\\/]*) ;;
-	*)
-	  absdir=`cd "$dir" && pwd`
-	  test -z "$absdir" && \
-	    func_fatal_error "cannot determine absolute directory name of \`$dir'"
-	  dir="$absdir"
-	  ;;
-	esac
-	case "$deplibs " in
-	*" -L$dir "* | *" $arg "*)
-	  # Will only happen for absolute or sysroot arguments
-	  ;;
-	*)
-	  # Preserve sysroot, but never include relative directories
-	  case $dir in
-	    [\\/]* | [A-Za-z]:[\\/]* | =*) func_append deplibs " $arg" ;;
-	    *) func_append deplibs " -L$dir" ;;
-	  esac
-	  func_append lib_search_path " $dir"
-	  ;;
-	esac
-	case $host in
-	*-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-os2* | *-cegcc*)
-	  testbindir=`$ECHO "$dir" | $SED 's*/lib$*/bin*'`
-	  case :$dllsearchpath: in
-	  *":$dir:"*) ;;
-	  ::) dllsearchpath=$dir;;
-	  *) func_append dllsearchpath ":$dir";;
-	  esac
-	  case :$dllsearchpath: in
-	  *":$testbindir:"*) ;;
-	  ::) dllsearchpath=$testbindir;;
-	  *) func_append dllsearchpath ":$testbindir";;
-	  esac
-	  ;;
-	esac
-	continue
-	;;
-
-      -l*)
-	if test "X$arg" = "X-lc" || test "X$arg" = "X-lm"; then
-	  case $host in
-	  *-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-beos* | *-cegcc* | *-*-haiku*)
-	    # These systems don't actually have a C or math library (as such)
-	    continue
-	    ;;
-	  *-*-os2*)
-	    # These systems don't actually have a C library (as such)
-	    test "X$arg" = "X-lc" && continue
-	    ;;
-	  *-*-openbsd* | *-*-freebsd* | *-*-dragonfly*)
-	    # Do not include libc due to us having libc/libc_r.
-	    test "X$arg" = "X-lc" && continue
-	    ;;
-	  *-*-rhapsody* | *-*-darwin1.[012])
-	    # Rhapsody C and math libraries are in the System framework
-	    func_append deplibs " System.ltframework"
-	    continue
-	    ;;
-	  *-*-sco3.2v5* | *-*-sco5v6*)
-	    # Causes problems with __ctype
-	    test "X$arg" = "X-lc" && continue
-	    ;;
-	  *-*-sysv4.2uw2* | *-*-sysv5* | *-*-unixware* | *-*-OpenUNIX*)
-	    # Compiler inserts libc in the correct place for threads to work
-	    test "X$arg" = "X-lc" && continue
-	    ;;
-	  esac
-	elif test "X$arg" = "X-lc_r"; then
-	 case $host in
-	 *-*-openbsd* | *-*-freebsd* | *-*-dragonfly*)
-	   # Do not include libc_r directly, use -pthread flag.
-	   continue
-	   ;;
-	 esac
-	fi
-	func_append deplibs " $arg"
-	continue
-	;;
-
-      -module)
-	module=yes
-	continue
-	;;
-
-      # Tru64 UNIX uses -model [arg] to determine the layout of C++
-      # classes, name mangling, and exception handling.
-      # Darwin uses the -arch flag to determine output architecture.
-      -model|-arch|-isysroot|--sysroot)
-	func_append compiler_flags " $arg"
-	func_append compile_command " $arg"
-	func_append finalize_command " $arg"
-	prev=xcompiler
-	continue
-	;;
-
-      -mt|-mthreads|-kthread|-Kthread|-pthread|-pthreads|--thread-safe \
-      |-threads|-fopenmp|-openmp|-mp|-xopenmp|-omp|-qsmp=*)
-	func_append compiler_flags " $arg"
-	func_append compile_command " $arg"
-	func_append finalize_command " $arg"
-	case "$new_inherited_linker_flags " in
-	    *" $arg "*) ;;
-	    * ) func_append new_inherited_linker_flags " $arg" ;;
-	esac
-	continue
-	;;
-
-      -multi_module)
-	single_module="${wl}-multi_module"
-	continue
-	;;
-
-      -no-fast-install)
-	fast_install=no
-	continue
-	;;
-
-      -no-install)
-	case $host in
-	*-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-os2* | *-*-darwin* | *-cegcc*)
-	  # The PATH hackery in wrapper scripts is required on Windows
-	  # and Darwin in order for the loader to find any dlls it needs.
-	  func_warning "\`-no-install' is ignored for $host"
-	  func_warning "assuming \`-no-fast-install' instead"
-	  fast_install=no
-	  ;;
-	*) no_install=yes ;;
-	esac
-	continue
-	;;
-
-      -no-undefined)
-	allow_undefined=no
-	continue
-	;;
-
-      -objectlist)
-	prev=objectlist
-	continue
-	;;
-
-      -o) prev=output ;;
-
-      -precious-files-regex)
-	prev=precious_regex
-	continue
-	;;
-
-      -release)
-	prev=release
-	continue
-	;;
-
-      -rpath)
-	prev=rpath
-	continue
-	;;
-
-      -R)
-	prev=xrpath
-	continue
-	;;
-
-      -R*)
-	func_stripname '-R' '' "$arg"
-	dir=$func_stripname_result
-	# We need an absolute path.
-	case $dir in
-	[\\/]* | [A-Za-z]:[\\/]*) ;;
-	=*)
-	  func_stripname '=' '' "$dir"
-	  dir=$lt_sysroot$func_stripname_result
-	  ;;
-	*)
-	  func_fatal_error "only absolute run-paths are allowed"
-	  ;;
-	esac
-	case "$xrpath " in
-	*" $dir "*) ;;
-	*) func_append xrpath " $dir" ;;
-	esac
-	continue
-	;;
-
-      -shared)
-	# The effects of -shared are defined in a previous loop.
-	continue
-	;;
-
-      -shrext)
-	prev=shrext
-	continue
-	;;
-
-      -static | -static-libtool-libs)
-	# The effects of -static are defined in a previous loop.
-	# We used to do the same as -all-static on platforms that
-	# didn't have a PIC flag, but the assumption that the effects
-	# would be equivalent was wrong.  It would break on at least
-	# Digital Unix and AIX.
-	continue
-	;;
-
-      -thread-safe)
-	thread_safe=yes
-	continue
-	;;
-
-      -version-info)
-	prev=vinfo
-	continue
-	;;
-
-      -version-number)
-	prev=vinfo
-	vinfo_number=yes
-	continue
-	;;
-
-      -weak)
-        prev=weak
-	continue
-	;;
-
-      -Wc,*)
-	func_stripname '-Wc,' '' "$arg"
-	args=$func_stripname_result
-	arg=
-	save_ifs="$IFS"; IFS=','
-	for flag in $args; do
-	  IFS="$save_ifs"
-          func_quote_for_eval "$flag"
-	  func_append arg " $func_quote_for_eval_result"
-	  func_append compiler_flags " $func_quote_for_eval_result"
-	done
-	IFS="$save_ifs"
-	func_stripname ' ' '' "$arg"
-	arg=$func_stripname_result
-	;;
-
-      -Wl,*)
-	func_stripname '-Wl,' '' "$arg"
-	args=$func_stripname_result
-	arg=
-	save_ifs="$IFS"; IFS=','
-	for flag in $args; do
-	  IFS="$save_ifs"
-          func_quote_for_eval "$flag"
-	  func_append arg " $wl$func_quote_for_eval_result"
-	  func_append compiler_flags " $wl$func_quote_for_eval_result"
-	  func_append linker_flags " $func_quote_for_eval_result"
-	done
-	IFS="$save_ifs"
-	func_stripname ' ' '' "$arg"
-	arg=$func_stripname_result
-	;;
-
-      -Xcompiler)
-	prev=xcompiler
-	continue
-	;;
-
-      -Xlinker)
-	prev=xlinker
-	continue
-	;;
-
-      -XCClinker)
-	prev=xcclinker
-	continue
-	;;
-
-      # -msg_* for osf cc
-      -msg_*)
-	func_quote_for_eval "$arg"
-	arg="$func_quote_for_eval_result"
-	;;
-
-      # Flags to be passed through unchanged, with rationale:
-      # -64, -mips[0-9]      enable 64-bit mode for the SGI compiler
-      # -r[0-9][0-9]*        specify processor for the SGI compiler
-      # -xarch=*, -xtarget=* enable 64-bit mode for the Sun compiler
-      # +DA*, +DD*           enable 64-bit mode for the HP compiler
-      # -q*                  compiler args for the IBM compiler
-      # -m*, -t[45]*, -txscale* architecture-specific flags for GCC
-      # -F/path              path to uninstalled frameworks, gcc on darwin
-      # -p, -pg, --coverage, -fprofile-*  profiling flags for GCC
-      # @file                GCC response files
-      # -tp=*                Portland pgcc target processor selection
-      # --sysroot=*          for sysroot support
-      # -O*, -flto*, -fwhopr*, -fuse-linker-plugin GCC link-time optimization
-      -64|-mips[0-9]|-r[0-9][0-9]*|-xarch=*|-xtarget=*|+DA*|+DD*|-q*|-m*| \
-      -t[45]*|-txscale*|-p|-pg|--coverage|-fprofile-*|-F*|@*|-tp=*|--sysroot=*| \
-      -O*|-flto*|-fwhopr*|-fuse-linker-plugin)
-        func_quote_for_eval "$arg"
-	arg="$func_quote_for_eval_result"
-        func_append compile_command " $arg"
-        func_append finalize_command " $arg"
-        func_append compiler_flags " $arg"
-        continue
-        ;;
-
-      # Some other compiler flag.
-      -* | +*)
-        func_quote_for_eval "$arg"
-	arg="$func_quote_for_eval_result"
-	;;
-
-      *.$objext)
-	# A standard object.
-	func_append objs " $arg"
-	;;
-
-      *.lo)
-	# A libtool-controlled object.
-
-	# Check to see that this really is a libtool object.
-	if func_lalib_unsafe_p "$arg"; then
-	  pic_object=
-	  non_pic_object=
-
-	  # Read the .lo file
-	  func_source "$arg"
-
-	  if test -z "$pic_object" ||
-	     test -z "$non_pic_object" ||
-	     test "$pic_object" = none &&
-	     test "$non_pic_object" = none; then
-	    func_fatal_error "cannot find name of object for \`$arg'"
-	  fi
-
-	  # Extract subdirectory from the argument.
-	  func_dirname "$arg" "/" ""
-	  xdir="$func_dirname_result"
-
-	  if test "$pic_object" != none; then
-	    # Prepend the subdirectory the object is found in.
-	    pic_object="$xdir$pic_object"
-
-	    if test "$prev" = dlfiles; then
-	      if test "$build_libtool_libs" = yes && test "$dlopen_support" = yes; then
-		func_append dlfiles " $pic_object"
-		prev=
-		continue
-	      else
-		# If libtool objects are unsupported, then we need to preload.
-		prev=dlprefiles
-	      fi
-	    fi
-
-	    # CHECK ME:  I think I busted this.  -Ossama
-	    if test "$prev" = dlprefiles; then
-	      # Preload the old-style object.
-	      func_append dlprefiles " $pic_object"
-	      prev=
-	    fi
-
-	    # A PIC object.
-	    func_append libobjs " $pic_object"
-	    arg="$pic_object"
-	  fi
-
-	  # Non-PIC object.
-	  if test "$non_pic_object" != none; then
-	    # Prepend the subdirectory the object is found in.
-	    non_pic_object="$xdir$non_pic_object"
-
-	    # A standard non-PIC object
-	    func_append non_pic_objects " $non_pic_object"
-	    if test -z "$pic_object" || test "$pic_object" = none ; then
-	      arg="$non_pic_object"
-	    fi
-	  else
-	    # If the PIC object exists, use it instead.
-	    # $xdir was prepended to $pic_object above.
-	    non_pic_object="$pic_object"
-	    func_append non_pic_objects " $non_pic_object"
-	  fi
-	else
-	  # Only an error if not doing a dry-run.
-	  if $opt_dry_run; then
-	    # Extract subdirectory from the argument.
-	    func_dirname "$arg" "/" ""
-	    xdir="$func_dirname_result"
-
-	    func_lo2o "$arg"
-	    pic_object=$xdir$objdir/$func_lo2o_result
-	    non_pic_object=$xdir$func_lo2o_result
-	    func_append libobjs " $pic_object"
-	    func_append non_pic_objects " $non_pic_object"
-	  else
-	    func_fatal_error "\`$arg' is not a valid libtool object"
-	  fi
-	fi
-	;;
-
-      *.$libext)
-	# An archive.
-	func_append deplibs " $arg"
-	func_append old_deplibs " $arg"
-	continue
-	;;
-
-      *.la)
-	# A libtool-controlled library.
-
-	func_resolve_sysroot "$arg"
-	if test "$prev" = dlfiles; then
-	  # This library was specified with -dlopen.
-	  func_append dlfiles " $func_resolve_sysroot_result"
-	  prev=
-	elif test "$prev" = dlprefiles; then
-	  # The library was specified with -dlpreopen.
-	  func_append dlprefiles " $func_resolve_sysroot_result"
-	  prev=
-	else
-	  func_append deplibs " $func_resolve_sysroot_result"
-	fi
-	continue
-	;;
-
-      # Some other compiler argument.
-      *)
-	# Unknown arguments in both finalize_command and compile_command need
-	# to be aesthetically quoted because they are evaled later.
-	func_quote_for_eval "$arg"
-	arg="$func_quote_for_eval_result"
-	;;
-      esac # arg
-
-      # Now actually substitute the argument into the commands.
-      if test -n "$arg"; then
-	func_append compile_command " $arg"
-	func_append finalize_command " $arg"
-      fi
-    done # argument parsing loop
-
-    test -n "$prev" && \
-      func_fatal_help "the \`$prevarg' option requires an argument"
-
-    if test "$export_dynamic" = yes && test -n "$export_dynamic_flag_spec"; then
-      eval arg=\"$export_dynamic_flag_spec\"
-      func_append compile_command " $arg"
-      func_append finalize_command " $arg"
-    fi
-
-    oldlibs=
-    # calculate the name of the file, without its directory
-    func_basename "$output"
-    outputname="$func_basename_result"
-    libobjs_save="$libobjs"
-
-    if test -n "$shlibpath_var"; then
-      # get the directories listed in $shlibpath_var
-      eval shlib_search_path=\`\$ECHO \"\${$shlibpath_var}\" \| \$SED \'s/:/ /g\'\`
-    else
-      shlib_search_path=
-    fi
-    eval sys_lib_search_path=\"$sys_lib_search_path_spec\"
-    eval sys_lib_dlsearch_path=\"$sys_lib_dlsearch_path_spec\"
-
-    func_dirname "$output" "/" ""
-    output_objdir="$func_dirname_result$objdir"
-    func_to_tool_file "$output_objdir/"
-    tool_output_objdir=$func_to_tool_file_result
-    # Create the object directory.
-    func_mkdir_p "$output_objdir"
-
-    # Determine the type of output
-    case $output in
-    "")
-      func_fatal_help "you must specify an output file"
-      ;;
-    *.$libext) linkmode=oldlib ;;
-    *.lo | *.$objext) linkmode=obj ;;
-    *.la) linkmode=lib ;;
-    *) linkmode=prog ;; # Anything else should be a program.
-    esac
-
-    specialdeplibs=
-
-    libs=
-    # Find all interdependent deplibs by searching for libraries
-    # that are linked more than once (e.g. -la -lb -la)
-    for deplib in $deplibs; do
-      if $opt_preserve_dup_deps ; then
-	case "$libs " in
-	*" $deplib "*) func_append specialdeplibs " $deplib" ;;
-	esac
-      fi
-      func_append libs " $deplib"
-    done
-
-    if test "$linkmode" = lib; then
-      libs="$predeps $libs $compiler_lib_search_path $postdeps"
-
-      # Compute libraries that are listed more than once in $predeps
-      # $postdeps and mark them as special (i.e., whose duplicates are
-      # not to be eliminated).
-      pre_post_deps=
-      if $opt_duplicate_compiler_generated_deps; then
-	for pre_post_dep in $predeps $postdeps; do
-	  case "$pre_post_deps " in
-	  *" $pre_post_dep "*) func_append specialdeplibs " $pre_post_deps" ;;
-	  esac
-	  func_append pre_post_deps " $pre_post_dep"
-	done
-      fi
-      pre_post_deps=
-    fi
-
-    deplibs=
-    newdependency_libs=
-    newlib_search_path=
-    need_relink=no # whether we're linking any uninstalled libtool libraries
-    notinst_deplibs= # not-installed libtool libraries
-    notinst_path= # paths that contain not-installed libtool libraries
-
-    case $linkmode in
-    lib)
-	passes="conv dlpreopen link"
-	for file in $dlfiles $dlprefiles; do
-	  case $file in
-	  *.la) ;;
-	  *)
-	    func_fatal_help "libraries can \`-dlopen' only libtool libraries: $file"
-	    ;;
-	  esac
-	done
-	;;
-    prog)
-	compile_deplibs=
-	finalize_deplibs=
-	alldeplibs=no
-	newdlfiles=
-	newdlprefiles=
-	passes="conv scan dlopen dlpreopen link"
-	;;
-    *)  passes="conv"
-	;;
-    esac
-
-    for pass in $passes; do
-      # The preopen pass in lib mode reverses $deplibs; put it back here
-      # so that -L comes before libs that need it for instance...
-      if test "$linkmode,$pass" = "lib,link"; then
-	## FIXME: Find the place where the list is rebuilt in the wrong
-	##        order, and fix it there properly
-        tmp_deplibs=
-	for deplib in $deplibs; do
-	  tmp_deplibs="$deplib $tmp_deplibs"
-	done
-	deplibs="$tmp_deplibs"
-      fi
-
-      if test "$linkmode,$pass" = "lib,link" ||
-	 test "$linkmode,$pass" = "prog,scan"; then
-	libs="$deplibs"
-	deplibs=
-      fi
-      if test "$linkmode" = prog; then
-	case $pass in
-	dlopen) libs="$dlfiles" ;;
-	dlpreopen) libs="$dlprefiles" ;;
-	link) libs="$deplibs %DEPLIBS% $dependency_libs" ;;
-	esac
-      fi
-      if test "$linkmode,$pass" = "lib,dlpreopen"; then
-	# Collect and forward deplibs of preopened libtool libs
-	for lib in $dlprefiles; do
-	  # Ignore non-libtool-libs
-	  dependency_libs=
-	  func_resolve_sysroot "$lib"
-	  case $lib in
-	  *.la)	func_source "$func_resolve_sysroot_result" ;;
-	  esac
-
-	  # Collect preopened libtool deplibs, except any this library
-	  # has declared as weak libs
-	  for deplib in $dependency_libs; do
-	    func_basename "$deplib"
-            deplib_base=$func_basename_result
-	    case " $weak_libs " in
-	    *" $deplib_base "*) ;;
-	    *) func_append deplibs " $deplib" ;;
-	    esac
-	  done
-	done
-	libs="$dlprefiles"
-      fi
-      if test "$pass" = dlopen; then
-	# Collect dlpreopened libraries
-	save_deplibs="$deplibs"
-	deplibs=
-      fi
-
-      for deplib in $libs; do
-	lib=
-	found=no
-	case $deplib in
-	-mt|-mthreads|-kthread|-Kthread|-pthread|-pthreads|--thread-safe \
-        |-threads|-fopenmp|-openmp|-mp|-xopenmp|-omp|-qsmp=*)
-	  if test "$linkmode,$pass" = "prog,link"; then
-	    compile_deplibs="$deplib $compile_deplibs"
-	    finalize_deplibs="$deplib $finalize_deplibs"
-	  else
-	    func_append compiler_flags " $deplib"
-	    if test "$linkmode" = lib ; then
-		case "$new_inherited_linker_flags " in
-		    *" $deplib "*) ;;
-		    * ) func_append new_inherited_linker_flags " $deplib" ;;
-		esac
-	    fi
-	  fi
-	  continue
-	  ;;
-	-l*)
-	  if test "$linkmode" != lib && test "$linkmode" != prog; then
-	    func_warning "\`-l' is ignored for archives/objects"
-	    continue
-	  fi
-	  func_stripname '-l' '' "$deplib"
-	  name=$func_stripname_result
-	  if test "$linkmode" = lib; then
-	    searchdirs="$newlib_search_path $lib_search_path $compiler_lib_search_dirs $sys_lib_search_path $shlib_search_path"
-	  else
-	    searchdirs="$newlib_search_path $lib_search_path $sys_lib_search_path $shlib_search_path"
-	  fi
-	  for searchdir in $searchdirs; do
-	    for search_ext in .la $std_shrext .so .a; do
-	      # Search the libtool library
-	      lib="$searchdir/lib${name}${search_ext}"
-	      if test -f "$lib"; then
-		if test "$search_ext" = ".la"; then
-		  found=yes
-		else
-		  found=no
-		fi
-		break 2
-	      fi
-	    done
-	  done
-	  if test "$found" != yes; then
-	    # deplib doesn't seem to be a libtool library
-	    if test "$linkmode,$pass" = "prog,link"; then
-	      compile_deplibs="$deplib $compile_deplibs"
-	      finalize_deplibs="$deplib $finalize_deplibs"
-	    else
-	      deplibs="$deplib $deplibs"
-	      test "$linkmode" = lib && newdependency_libs="$deplib $newdependency_libs"
-	    fi
-	    continue
-	  else # deplib is a libtool library
-	    # If $allow_libtool_libs_with_static_runtimes && $deplib is a stdlib,
-	    # We need to do some special things here, and not later.
-	    if test "X$allow_libtool_libs_with_static_runtimes" = "Xyes" ; then
-	      case " $predeps $postdeps " in
-	      *" $deplib "*)
-		if func_lalib_p "$lib"; then
-		  library_names=
-		  old_library=
-		  func_source "$lib"
-		  for l in $old_library $library_names; do
-		    ll="$l"
-		  done
-		  if test "X$ll" = "X$old_library" ; then # only static version available
-		    found=no
-		    func_dirname "$lib" "" "."
-		    ladir="$func_dirname_result"
-		    lib=$ladir/$old_library
-		    if test "$linkmode,$pass" = "prog,link"; then
-		      compile_deplibs="$deplib $compile_deplibs"
-		      finalize_deplibs="$deplib $finalize_deplibs"
-		    else
-		      deplibs="$deplib $deplibs"
-		      test "$linkmode" = lib && newdependency_libs="$deplib $newdependency_libs"
-		    fi
-		    continue
-		  fi
-		fi
-		;;
-	      *) ;;
-	      esac
-	    fi
-	  fi
-	  ;; # -l
-	*.ltframework)
-	  if test "$linkmode,$pass" = "prog,link"; then
-	    compile_deplibs="$deplib $compile_deplibs"
-	    finalize_deplibs="$deplib $finalize_deplibs"
-	  else
-	    deplibs="$deplib $deplibs"
-	    if test "$linkmode" = lib ; then
-		case "$new_inherited_linker_flags " in
-		    *" $deplib "*) ;;
-		    * ) func_append new_inherited_linker_flags " $deplib" ;;
-		esac
-	    fi
-	  fi
-	  continue
-	  ;;
-	-L*)
-	  case $linkmode in
-	  lib)
-	    deplibs="$deplib $deplibs"
-	    test "$pass" = conv && continue
-	    newdependency_libs="$deplib $newdependency_libs"
-	    func_stripname '-L' '' "$deplib"
-	    func_resolve_sysroot "$func_stripname_result"
-	    func_append newlib_search_path " $func_resolve_sysroot_result"
-	    ;;
-	  prog)
-	    if test "$pass" = conv; then
-	      deplibs="$deplib $deplibs"
-	      continue
-	    fi
-	    if test "$pass" = scan; then
-	      deplibs="$deplib $deplibs"
-	    else
-	      compile_deplibs="$deplib $compile_deplibs"
-	      finalize_deplibs="$deplib $finalize_deplibs"
-	    fi
-	    func_stripname '-L' '' "$deplib"
-	    func_resolve_sysroot "$func_stripname_result"
-	    func_append newlib_search_path " $func_resolve_sysroot_result"
-	    ;;
-	  *)
-	    func_warning "\`-L' is ignored for archives/objects"
-	    ;;
-	  esac # linkmode
-	  continue
-	  ;; # -L
-	-R*)
-	  if test "$pass" = link; then
-	    func_stripname '-R' '' "$deplib"
-	    func_resolve_sysroot "$func_stripname_result"
-	    dir=$func_resolve_sysroot_result
-	    # Make sure the xrpath contains only unique directories.
-	    case "$xrpath " in
-	    *" $dir "*) ;;
-	    *) func_append xrpath " $dir" ;;
-	    esac
-	  fi
-	  deplibs="$deplib $deplibs"
-	  continue
-	  ;;
-	*.la)
-	  func_resolve_sysroot "$deplib"
-	  lib=$func_resolve_sysroot_result
-	  ;;
-	*.$libext)
-	  if test "$pass" = conv; then
-	    deplibs="$deplib $deplibs"
-	    continue
-	  fi
-	  case $linkmode in
-	  lib)
-	    # Linking convenience modules into shared libraries is allowed,
-	    # but linking other static libraries is non-portable.
-	    case " $dlpreconveniencelibs " in
-	    *" $deplib "*) ;;
-	    *)
-	      valid_a_lib=no
-	      case $deplibs_check_method in
-		match_pattern*)
-		  set dummy $deplibs_check_method; shift
-		  match_pattern_regex=`expr "$deplibs_check_method" : "$1 \(.*\)"`
-		  if eval "\$ECHO \"$deplib\"" 2>/dev/null | $SED 10q \
-		    | $EGREP "$match_pattern_regex" > /dev/null; then
-		    valid_a_lib=yes
-		  fi
-		;;
-		pass_all)
-		  valid_a_lib=yes
-		;;
-	      esac
-	      if test "$valid_a_lib" != yes; then
-		echo
-		$ECHO "*** Warning: Trying to link with static lib archive $deplib."
-		echo "*** I have the capability to make that library automatically link in when"
-		echo "*** you link to this library.  But I can only do this if you have a"
-		echo "*** shared version of the library, which you do not appear to have"
-		echo "*** because the file extensions .$libext of this argument makes me believe"
-		echo "*** that it is just a static archive that I should not use here."
-	      else
-		echo
-		$ECHO "*** Warning: Linking the shared library $output against the"
-		$ECHO "*** static library $deplib is not portable!"
-		deplibs="$deplib $deplibs"
-	      fi
-	      ;;
-	    esac
-	    continue
-	    ;;
-	  prog)
-	    if test "$pass" != link; then
-	      deplibs="$deplib $deplibs"
-	    else
-	      compile_deplibs="$deplib $compile_deplibs"
-	      finalize_deplibs="$deplib $finalize_deplibs"
-	    fi
-	    continue
-	    ;;
-	  esac # linkmode
-	  ;; # *.$libext
-	*.lo | *.$objext)
-	  if test "$pass" = conv; then
-	    deplibs="$deplib $deplibs"
-	  elif test "$linkmode" = prog; then
-	    if test "$pass" = dlpreopen || test "$dlopen_support" != yes || test "$build_libtool_libs" = no; then
-	      # If there is no dlopen support or we're linking statically,
-	      # we need to preload.
-	      func_append newdlprefiles " $deplib"
-	      compile_deplibs="$deplib $compile_deplibs"
-	      finalize_deplibs="$deplib $finalize_deplibs"
-	    else
-	      func_append newdlfiles " $deplib"
-	    fi
-	  fi
-	  continue
-	  ;;
-	%DEPLIBS%)
-	  alldeplibs=yes
-	  continue
-	  ;;
-	esac # case $deplib
-
-	if test "$found" = yes || test -f "$lib"; then :
-	else
-	  func_fatal_error "cannot find the library \`$lib' or unhandled argument \`$deplib'"
-	fi
-
-	# Check to see that this really is a libtool archive.
-	func_lalib_unsafe_p "$lib" \
-	  || func_fatal_error "\`$lib' is not a valid libtool archive"
-
-	func_dirname "$lib" "" "."
-	ladir="$func_dirname_result"
-
-	dlname=
-	dlopen=
-	dlpreopen=
-	libdir=
-	library_names=
-	old_library=
-	inherited_linker_flags=
-	# If the library was installed with an old release of libtool,
-	# it will not redefine variables installed, or shouldnotlink
-	installed=yes
-	shouldnotlink=no
-	avoidtemprpath=
-
-
-	# Read the .la file
-	func_source "$lib"
-
-	# Convert "-framework foo" to "foo.ltframework"
-	if test -n "$inherited_linker_flags"; then
-	  tmp_inherited_linker_flags=`$ECHO "$inherited_linker_flags" | $SED 's/-framework \([^ $]*\)/\1.ltframework/g'`
-	  for tmp_inherited_linker_flag in $tmp_inherited_linker_flags; do
-	    case " $new_inherited_linker_flags " in
-	      *" $tmp_inherited_linker_flag "*) ;;
-	      *) func_append new_inherited_linker_flags " $tmp_inherited_linker_flag";;
-	    esac
-	  done
-	fi
-	dependency_libs=`$ECHO " $dependency_libs" | $SED 's% \([^ $]*\).ltframework% -framework \1%g'`
-	if test "$linkmode,$pass" = "lib,link" ||
-	   test "$linkmode,$pass" = "prog,scan" ||
-	   { test "$linkmode" != prog && test "$linkmode" != lib; }; then
-	  test -n "$dlopen" && func_append dlfiles " $dlopen"
-	  test -n "$dlpreopen" && func_append dlprefiles " $dlpreopen"
-	fi
-
-	if test "$pass" = conv; then
-	  # Only check for convenience libraries
-	  deplibs="$lib $deplibs"
-	  if test -z "$libdir"; then
-	    if test -z "$old_library"; then
-	      func_fatal_error "cannot find name of link library for \`$lib'"
-	    fi
-	    # It is a libtool convenience library, so add in its objects.
-	    func_append convenience " $ladir/$objdir/$old_library"
-	    func_append old_convenience " $ladir/$objdir/$old_library"
-	  elif test "$linkmode" != prog && test "$linkmode" != lib; then
-	    func_fatal_error "\`$lib' is not a convenience library"
-	  fi
-	  tmp_libs=
-	  for deplib in $dependency_libs; do
-	    deplibs="$deplib $deplibs"
-	    if $opt_preserve_dup_deps ; then
-	      case "$tmp_libs " in
-	      *" $deplib "*) func_append specialdeplibs " $deplib" ;;
-	      esac
-	    fi
-	    func_append tmp_libs " $deplib"
-	  done
-	  continue
-	fi # $pass = conv
-
-
-	# Get the name of the library we link against.
-	linklib=
-	if test -n "$old_library" &&
-	   { test "$prefer_static_libs" = yes ||
-	     test "$prefer_static_libs,$installed" = "built,no"; }; then
-	  linklib=$old_library
-	else
-	  for l in $old_library $library_names; do
-	    linklib="$l"
-	  done
-	fi
-	if test -z "$linklib"; then
-	  func_fatal_error "cannot find name of link library for \`$lib'"
-	fi
-
-	# This library was specified with -dlopen.
-	if test "$pass" = dlopen; then
-	  if test -z "$libdir"; then
-	    func_fatal_error "cannot -dlopen a convenience library: \`$lib'"
-	  fi
-	  if test -z "$dlname" ||
-	     test "$dlopen_support" != yes ||
-	     test "$build_libtool_libs" = no; then
-	    # If there is no dlname, no dlopen support or we're linking
-	    # statically, we need to preload.  We also need to preload any
-	    # dependent libraries so libltdl's deplib preloader doesn't
-	    # bomb out in the load deplibs phase.
-	    func_append dlprefiles " $lib $dependency_libs"
-	  else
-	    func_append newdlfiles " $lib"
-	  fi
-	  continue
-	fi # $pass = dlopen
-
-	# We need an absolute path.
-	case $ladir in
-	[\\/]* | [A-Za-z]:[\\/]*) abs_ladir="$ladir" ;;
-	*)
-	  abs_ladir=`cd "$ladir" && pwd`
-	  if test -z "$abs_ladir"; then
-	    func_warning "cannot determine absolute directory name of \`$ladir'"
-	    func_warning "passing it literally to the linker, although it might fail"
-	    abs_ladir="$ladir"
-	  fi
-	  ;;
-	esac
-	func_basename "$lib"
-	laname="$func_basename_result"
-
-	# Find the relevant object directory and library name.
-	if test "X$installed" = Xyes; then
-	  if test ! -f "$lt_sysroot$libdir/$linklib" && test -f "$abs_ladir/$linklib"; then
-	    func_warning "library \`$lib' was moved."
-	    dir="$ladir"
-	    absdir="$abs_ladir"
-	    libdir="$abs_ladir"
-	  else
-	    dir="$lt_sysroot$libdir"
-	    absdir="$lt_sysroot$libdir"
-	  fi
-	  test "X$hardcode_automatic" = Xyes && avoidtemprpath=yes
-	else
-	  if test ! -f "$ladir/$objdir/$linklib" && test -f "$abs_ladir/$linklib"; then
-	    dir="$ladir"
-	    absdir="$abs_ladir"
-	    # Remove this search path later
-	    func_append notinst_path " $abs_ladir"
-	  else
-	    dir="$ladir/$objdir"
-	    absdir="$abs_ladir/$objdir"
-	    # Remove this search path later
-	    func_append notinst_path " $abs_ladir"
-	  fi
-	fi # $installed = yes
-	func_stripname 'lib' '.la' "$laname"
-	name=$func_stripname_result
-
-	# This library was specified with -dlpreopen.
-	if test "$pass" = dlpreopen; then
-	  if test -z "$libdir" && test "$linkmode" = prog; then
-	    func_fatal_error "only libraries may -dlpreopen a convenience library: \`$lib'"
-	  fi
-	  case "$host" in
-	    # special handling for platforms with PE-DLLs.
-	    *cygwin* | *mingw* | *cegcc* )
-	      # Linker will automatically link against shared library if both
-	      # static and shared are present.  Therefore, ensure we extract
-	      # symbols from the import library if a shared library is present
-	      # (otherwise, the dlopen module name will be incorrect).  We do
-	      # this by putting the import library name into $newdlprefiles.
-	      # We recover the dlopen module name by 'saving' the la file
-	      # name in a special purpose variable, and (later) extracting the
-	      # dlname from the la file.
-	      if test -n "$dlname"; then
-	        func_tr_sh "$dir/$linklib"
-	        eval "libfile_$func_tr_sh_result=\$abs_ladir/\$laname"
-	        func_append newdlprefiles " $dir/$linklib"
-	      else
-	        func_append newdlprefiles " $dir/$old_library"
-	        # Keep a list of preopened convenience libraries to check
-	        # that they are being used correctly in the link pass.
-	        test -z "$libdir" && \
-	          func_append dlpreconveniencelibs " $dir/$old_library"
-	      fi
-	    ;;
-	    * )
-	      # Prefer using a static library (so that no silly _DYNAMIC symbols
-	      # are required to link).
-	      if test -n "$old_library"; then
-	        func_append newdlprefiles " $dir/$old_library"
-	        # Keep a list of preopened convenience libraries to check
-	        # that they are being used correctly in the link pass.
-	        test -z "$libdir" && \
-	          func_append dlpreconveniencelibs " $dir/$old_library"
-	      # Otherwise, use the dlname, so that lt_dlopen finds it.
-	      elif test -n "$dlname"; then
-	        func_append newdlprefiles " $dir/$dlname"
-	      else
-	        func_append newdlprefiles " $dir/$linklib"
-	      fi
-	    ;;
-	  esac
-	fi # $pass = dlpreopen
-
-	if test -z "$libdir"; then
-	  # Link the convenience library
-	  if test "$linkmode" = lib; then
-	    deplibs="$dir/$old_library $deplibs"
-	  elif test "$linkmode,$pass" = "prog,link"; then
-	    compile_deplibs="$dir/$old_library $compile_deplibs"
-	    finalize_deplibs="$dir/$old_library $finalize_deplibs"
-	  else
-	    deplibs="$lib $deplibs" # used for prog,scan pass
-	  fi
-	  continue
-	fi
-
-
-	if test "$linkmode" = prog && test "$pass" != link; then
-	  func_append newlib_search_path " $ladir"
-	  deplibs="$lib $deplibs"
-
-	  linkalldeplibs=no
-	  if test "$link_all_deplibs" != no || test -z "$library_names" ||
-	     test "$build_libtool_libs" = no; then
-	    linkalldeplibs=yes
-	  fi
-
-	  tmp_libs=
-	  for deplib in $dependency_libs; do
-	    case $deplib in
-	    -L*) func_stripname '-L' '' "$deplib"
-	         func_resolve_sysroot "$func_stripname_result"
-	         func_append newlib_search_path " $func_resolve_sysroot_result"
-		 ;;
-	    esac
-	    # Need to link against all dependency_libs?
-	    if test "$linkalldeplibs" = yes; then
-	      deplibs="$deplib $deplibs"
-	    else
-	      # Need to hardcode shared library paths
-	      # or/and link against static libraries
-	      newdependency_libs="$deplib $newdependency_libs"
-	    fi
-	    if $opt_preserve_dup_deps ; then
-	      case "$tmp_libs " in
-	      *" $deplib "*) func_append specialdeplibs " $deplib" ;;
-	      esac
-	    fi
-	    func_append tmp_libs " $deplib"
-	  done # for deplib
-	  continue
-	fi # $linkmode = prog...
-
-	if test "$linkmode,$pass" = "prog,link"; then
-	  if test -n "$library_names" &&
-	     { { test "$prefer_static_libs" = no ||
-	         test "$prefer_static_libs,$installed" = "built,yes"; } ||
-	       test -z "$old_library"; }; then
-	    # We need to hardcode the library path
-	    if test -n "$shlibpath_var" && test -z "$avoidtemprpath" ; then
-	      # Make sure the rpath contains only unique directories.
-	      case "$temp_rpath:" in
-	      *"$absdir:"*) ;;
-	      *) func_append temp_rpath "$absdir:" ;;
-	      esac
-	    fi
-
-	    # Hardcode the library path.
-	    # Skip directories that are in the system default run-time
-	    # search path.
-	    case " $sys_lib_dlsearch_path " in
-	    *" $absdir "*) ;;
-	    *)
-	      case "$compile_rpath " in
-	      *" $absdir "*) ;;
-	      *) func_append compile_rpath " $absdir" ;;
-	      esac
-	      ;;
-	    esac
-	    case " $sys_lib_dlsearch_path " in
-	    *" $libdir "*) ;;
-	    *)
-	      case "$finalize_rpath " in
-	      *" $libdir "*) ;;
-	      *) func_append finalize_rpath " $libdir" ;;
-	      esac
-	      ;;
-	    esac
-	  fi # $linkmode,$pass = prog,link...
-
-	  if test "$alldeplibs" = yes &&
-	     { test "$deplibs_check_method" = pass_all ||
-	       { test "$build_libtool_libs" = yes &&
-		 test -n "$library_names"; }; }; then
-	    # We only need to search for static libraries
-	    continue
-	  fi
-	fi
-
-	link_static=no # Whether the deplib will be linked statically
-	use_static_libs=$prefer_static_libs
-	if test "$use_static_libs" = built && test "$installed" = yes; then
-	  use_static_libs=no
-	fi
-	if test -n "$library_names" &&
-	   { test "$use_static_libs" = no || test -z "$old_library"; }; then
-	  case $host in
-	  *cygwin* | *mingw* | *cegcc*)
-	      # No point in relinking DLLs because paths are not encoded
-	      func_append notinst_deplibs " $lib"
-	      need_relink=no
-	    ;;
-	  *)
-	    if test "$installed" = no; then
-	      func_append notinst_deplibs " $lib"
-	      need_relink=yes
-	    fi
-	    ;;
-	  esac
-	  # This is a shared library
-
-	  # Warn about portability, can't link against -module's on some
-	  # systems (darwin).  Don't bleat about dlopened modules though!
-	  dlopenmodule=""
-	  for dlpremoduletest in $dlprefiles; do
-	    if test "X$dlpremoduletest" = "X$lib"; then
-	      dlopenmodule="$dlpremoduletest"
-	      break
-	    fi
-	  done
-	  if test -z "$dlopenmodule" && test "$shouldnotlink" = yes && test "$pass" = link; then
-	    echo
-	    if test "$linkmode" = prog; then
-	      $ECHO "*** Warning: Linking the executable $output against the loadable module"
-	    else
-	      $ECHO "*** Warning: Linking the shared library $output against the loadable module"
-	    fi
-	    $ECHO "*** $linklib is not portable!"
-	  fi
-	  if test "$linkmode" = lib &&
-	     test "$hardcode_into_libs" = yes; then
-	    # Hardcode the library path.
-	    # Skip directories that are in the system default run-time
-	    # search path.
-	    case " $sys_lib_dlsearch_path " in
-	    *" $absdir "*) ;;
-	    *)
-	      case "$compile_rpath " in
-	      *" $absdir "*) ;;
-	      *) func_append compile_rpath " $absdir" ;;
-	      esac
-	      ;;
-	    esac
-	    case " $sys_lib_dlsearch_path " in
-	    *" $libdir "*) ;;
-	    *)
-	      case "$finalize_rpath " in
-	      *" $libdir "*) ;;
-	      *) func_append finalize_rpath " $libdir" ;;
-	      esac
-	      ;;
-	    esac
-	  fi
-
-	  if test -n "$old_archive_from_expsyms_cmds"; then
-	    # figure out the soname
-	    set dummy $library_names
-	    shift
-	    realname="$1"
-	    shift
-	    libname=`eval "\\$ECHO \"$libname_spec\""`
-	    # use dlname if we got it. it's perfectly good, no?
-	    if test -n "$dlname"; then
-	      soname="$dlname"
-	    elif test -n "$soname_spec"; then
-	      # bleh windows
-	      case $host in
-	      *cygwin* | mingw* | *cegcc*)
-	        func_arith $current - $age
-		major=$func_arith_result
-		versuffix="-$major"
-		;;
-	      esac
-	      eval soname=\"$soname_spec\"
-	    else
-	      soname="$realname"
-	    fi
-
-	    # Make a new name for the extract_expsyms_cmds to use
-	    soroot="$soname"
-	    func_basename "$soroot"
-	    soname="$func_basename_result"
-	    func_stripname 'lib' '.dll' "$soname"
-	    newlib=libimp-$func_stripname_result.a
-
-	    # If the library has no export list, then create one now
-	    if test -f "$output_objdir/$soname-def"; then :
-	    else
-	      func_verbose "extracting exported symbol list from \`$soname'"
-	      func_execute_cmds "$extract_expsyms_cmds" 'exit $?'
-	    fi
-
-	    # Create $newlib
-	    if test -f "$output_objdir/$newlib"; then :; else
-	      func_verbose "generating import library for \`$soname'"
-	      func_execute_cmds "$old_archive_from_expsyms_cmds" 'exit $?'
-	    fi
-	    # make sure the library variables are pointing to the new library
-	    dir=$output_objdir
-	    linklib=$newlib
-	  fi # test -n "$old_archive_from_expsyms_cmds"
-
-	  if test "$linkmode" = prog || test "$opt_mode" != relink; then
-	    add_shlibpath=
-	    add_dir=
-	    add=
-	    lib_linked=yes
-	    case $hardcode_action in
-	    immediate | unsupported)
-	      if test "$hardcode_direct" = no; then
-		add="$dir/$linklib"
-		case $host in
-		  *-*-sco3.2v5.0.[024]*) add_dir="-L$dir" ;;
-		  *-*-sysv4*uw2*) add_dir="-L$dir" ;;
-		  *-*-sysv5OpenUNIX* | *-*-sysv5UnixWare7.[01].[10]* | \
-		    *-*-unixware7*) add_dir="-L$dir" ;;
-		  *-*-darwin* )
-		    # if the lib is a (non-dlopened) module then we can not
-		    # link against it, someone is ignoring the earlier warnings
-		    if /usr/bin/file -L $add 2> /dev/null |
-			 $GREP ": [^:]* bundle" >/dev/null ; then
-		      if test "X$dlopenmodule" != "X$lib"; then
-			$ECHO "*** Warning: lib $linklib is a module, not a shared library"
-			if test -z "$old_library" ; then
-			  echo
-			  echo "*** And there doesn't seem to be a static archive available"
-			  echo "*** The link will probably fail, sorry"
-			else
-			  add="$dir/$old_library"
-			fi
-		      elif test -n "$old_library"; then
-			add="$dir/$old_library"
-		      fi
-		    fi
-		esac
-	      elif test "$hardcode_minus_L" = no; then
-		case $host in
-		*-*-sunos*) add_shlibpath="$dir" ;;
-		esac
-		add_dir="-L$dir"
-		add="-l$name"
-	      elif test "$hardcode_shlibpath_var" = no; then
-		add_shlibpath="$dir"
-		add="-l$name"
-	      else
-		lib_linked=no
-	      fi
-	      ;;
-	    relink)
-	      if test "$hardcode_direct" = yes &&
-	         test "$hardcode_direct_absolute" = no; then
-		add="$dir/$linklib"
-	      elif test "$hardcode_minus_L" = yes; then
-		add_dir="-L$absdir"
-		# Try looking first in the location we're being installed to.
-		if test -n "$inst_prefix_dir"; then
-		  case $libdir in
-		    [\\/]*)
-		      func_append add_dir " -L$inst_prefix_dir$libdir"
-		      ;;
-		  esac
-		fi
-		add="-l$name"
-	      elif test "$hardcode_shlibpath_var" = yes; then
-		add_shlibpath="$dir"
-		add="-l$name"
-	      else
-		lib_linked=no
-	      fi
-	      ;;
-	    *) lib_linked=no ;;
-	    esac
-
-	    if test "$lib_linked" != yes; then
-	      func_fatal_configuration "unsupported hardcode properties"
-	    fi
-
-	    if test -n "$add_shlibpath"; then
-	      case :$compile_shlibpath: in
-	      *":$add_shlibpath:"*) ;;
-	      *) func_append compile_shlibpath "$add_shlibpath:" ;;
-	      esac
-	    fi
-	    if test "$linkmode" = prog; then
-	      test -n "$add_dir" && compile_deplibs="$add_dir $compile_deplibs"
-	      test -n "$add" && compile_deplibs="$add $compile_deplibs"
-	    else
-	      test -n "$add_dir" && deplibs="$add_dir $deplibs"
-	      test -n "$add" && deplibs="$add $deplibs"
-	      if test "$hardcode_direct" != yes &&
-		 test "$hardcode_minus_L" != yes &&
-		 test "$hardcode_shlibpath_var" = yes; then
-		case :$finalize_shlibpath: in
-		*":$libdir:"*) ;;
-		*) func_append finalize_shlibpath "$libdir:" ;;
-		esac
-	      fi
-	    fi
-	  fi
-
-	  if test "$linkmode" = prog || test "$opt_mode" = relink; then
-	    add_shlibpath=
-	    add_dir=
-	    add=
-	    # Finalize command for both is simple: just hardcode it.
-	    if test "$hardcode_direct" = yes &&
-	       test "$hardcode_direct_absolute" = no; then
-	      add="$libdir/$linklib"
-	    elif test "$hardcode_minus_L" = yes; then
-	      add_dir="-L$libdir"
-	      add="-l$name"
-	    elif test "$hardcode_shlibpath_var" = yes; then
-	      case :$finalize_shlibpath: in
-	      *":$libdir:"*) ;;
-	      *) func_append finalize_shlibpath "$libdir:" ;;
-	      esac
-	      add="-l$name"
-	    elif test "$hardcode_automatic" = yes; then
-	      if test -n "$inst_prefix_dir" &&
-		 test -f "$inst_prefix_dir$libdir/$linklib" ; then
-		add="$inst_prefix_dir$libdir/$linklib"
-	      else
-		add="$libdir/$linklib"
-	      fi
-	    else
-	      # We cannot seem to hardcode it, guess we'll fake it.
-	      add_dir="-L$libdir"
-	      # Try looking first in the location we're being installed to.
-	      if test -n "$inst_prefix_dir"; then
-		case $libdir in
-		  [\\/]*)
-		    func_append add_dir " -L$inst_prefix_dir$libdir"
-		    ;;
-		esac
-	      fi
-	      add="-l$name"
-	    fi
-
-	    if test "$linkmode" = prog; then
-	      test -n "$add_dir" && finalize_deplibs="$add_dir $finalize_deplibs"
-	      test -n "$add" && finalize_deplibs="$add $finalize_deplibs"
-	    else
-	      test -n "$add_dir" && deplibs="$add_dir $deplibs"
-	      test -n "$add" && deplibs="$add $deplibs"
-	    fi
-	  fi
-	elif test "$linkmode" = prog; then
-	  # Here we assume that one of hardcode_direct or hardcode_minus_L
-	  # is not unsupported.  This is valid on all known static and
-	  # shared platforms.
-	  if test "$hardcode_direct" != unsupported; then
-	    test -n "$old_library" && linklib="$old_library"
-	    compile_deplibs="$dir/$linklib $compile_deplibs"
-	    finalize_deplibs="$dir/$linklib $finalize_deplibs"
-	  else
-	    compile_deplibs="-l$name -L$dir $compile_deplibs"
-	    finalize_deplibs="-l$name -L$dir $finalize_deplibs"
-	  fi
-	elif test "$build_libtool_libs" = yes; then
-	  # Not a shared library
-	  if test "$deplibs_check_method" != pass_all; then
-	    # We're trying link a shared library against a static one
-	    # but the system doesn't support it.
-
-	    # Just print a warning and add the library to dependency_libs so
-	    # that the program can be linked against the static library.
-	    echo
-	    $ECHO "*** Warning: This system can not link to static lib archive $lib."
-	    echo "*** I have the capability to make that library automatically link in when"
-	    echo "*** you link to this library.  But I can only do this if you have a"
-	    echo "*** shared version of the library, which you do not appear to have."
-	    if test "$module" = yes; then
-	      echo "*** But as you try to build a module library, libtool will still create "
-	      echo "*** a static module, that should work as long as the dlopening application"
-	      echo "*** is linked with the -dlopen flag to resolve symbols at runtime."
-	      if test -z "$global_symbol_pipe"; then
-		echo
-		echo "*** However, this would only work if libtool was able to extract symbol"
-		echo "*** lists from a program, using \`nm' or equivalent, but libtool could"
-		echo "*** not find such a program.  So, this module is probably useless."
-		echo "*** \`nm' from GNU binutils and a full rebuild may help."
-	      fi
-	      if test "$build_old_libs" = no; then
-		build_libtool_libs=module
-		build_old_libs=yes
-	      else
-		build_libtool_libs=no
-	      fi
-	    fi
-	  else
-	    deplibs="$dir/$old_library $deplibs"
-	    link_static=yes
-	  fi
-	fi # link shared/static library?
-
-	if test "$linkmode" = lib; then
-	  if test -n "$dependency_libs" &&
-	     { test "$hardcode_into_libs" != yes ||
-	       test "$build_old_libs" = yes ||
-	       test "$link_static" = yes; }; then
-	    # Extract -R from dependency_libs
-	    temp_deplibs=
-	    for libdir in $dependency_libs; do
-	      case $libdir in
-	      -R*) func_stripname '-R' '' "$libdir"
-	           temp_xrpath=$func_stripname_result
-		   case " $xrpath " in
-		   *" $temp_xrpath "*) ;;
-		   *) func_append xrpath " $temp_xrpath";;
-		   esac;;
-	      *) func_append temp_deplibs " $libdir";;
-	      esac
-	    done
-	    dependency_libs="$temp_deplibs"
-	  fi
-
-	  func_append newlib_search_path " $absdir"
-	  # Link against this library
-	  test "$link_static" = no && newdependency_libs="$abs_ladir/$laname $newdependency_libs"
-	  # ... and its dependency_libs
-	  tmp_libs=
-	  for deplib in $dependency_libs; do
-	    newdependency_libs="$deplib $newdependency_libs"
-	    case $deplib in
-              -L*) func_stripname '-L' '' "$deplib"
-                   func_resolve_sysroot "$func_stripname_result";;
-              *) func_resolve_sysroot "$deplib" ;;
-            esac
-	    if $opt_preserve_dup_deps ; then
-	      case "$tmp_libs " in
-	      *" $func_resolve_sysroot_result "*)
-                func_append specialdeplibs " $func_resolve_sysroot_result" ;;
-	      esac
-	    fi
-	    func_append tmp_libs " $func_resolve_sysroot_result"
-	  done
-
-	  if test "$link_all_deplibs" != no; then
-	    # Add the search paths of all dependency libraries
-	    for deplib in $dependency_libs; do
-	      path=
-	      case $deplib in
-	      -L*) path="$deplib" ;;
-	      *.la)
-	        func_resolve_sysroot "$deplib"
-	        deplib=$func_resolve_sysroot_result
-	        func_dirname "$deplib" "" "."
-		dir=$func_dirname_result
-		# We need an absolute path.
-		case $dir in
-		[\\/]* | [A-Za-z]:[\\/]*) absdir="$dir" ;;
-		*)
-		  absdir=`cd "$dir" && pwd`
-		  if test -z "$absdir"; then
-		    func_warning "cannot determine absolute directory name of \`$dir'"
-		    absdir="$dir"
-		  fi
-		  ;;
-		esac
-		if $GREP "^installed=no" $deplib > /dev/null; then
-		case $host in
-		*-*-darwin*)
-		  depdepl=
-		  eval deplibrary_names=`${SED} -n -e 's/^library_names=\(.*\)$/\1/p' $deplib`
-		  if test -n "$deplibrary_names" ; then
-		    for tmp in $deplibrary_names ; do
-		      depdepl=$tmp
-		    done
-		    if test -f "$absdir/$objdir/$depdepl" ; then
-		      depdepl="$absdir/$objdir/$depdepl"
-		      darwin_install_name=`${OTOOL} -L $depdepl | awk '{if (NR == 2) {print $1;exit}}'`
-                      if test -z "$darwin_install_name"; then
-                          darwin_install_name=`${OTOOL64} -L $depdepl  | awk '{if (NR == 2) {print $1;exit}}'`
-                      fi
-		      func_append compiler_flags " ${wl}-dylib_file ${wl}${darwin_install_name}:${depdepl}"
-		      func_append linker_flags " -dylib_file ${darwin_install_name}:${depdepl}"
-		      path=
-		    fi
-		  fi
-		  ;;
-		*)
-		  path="-L$absdir/$objdir"
-		  ;;
-		esac
-		else
-		  eval libdir=`${SED} -n -e 's/^libdir=\(.*\)$/\1/p' $deplib`
-		  test -z "$libdir" && \
-		    func_fatal_error "\`$deplib' is not a valid libtool archive"
-		  test "$absdir" != "$libdir" && \
-		    func_warning "\`$deplib' seems to be moved"
-
-		  path="-L$absdir"
-		fi
-		;;
-	      esac
-	      case " $deplibs " in
-	      *" $path "*) ;;
-	      *) deplibs="$path $deplibs" ;;
-	      esac
-	    done
-	  fi # link_all_deplibs != no
-	fi # linkmode = lib
-      done # for deplib in $libs
-      if test "$pass" = link; then
-	if test "$linkmode" = "prog"; then
-	  compile_deplibs="$new_inherited_linker_flags $compile_deplibs"
-	  finalize_deplibs="$new_inherited_linker_flags $finalize_deplibs"
-	else
-	  compiler_flags="$compiler_flags "`$ECHO " $new_inherited_linker_flags" | $SED 's% \([^ $]*\).ltframework% -framework \1%g'`
-	fi
-      fi
-      dependency_libs="$newdependency_libs"
-      if test "$pass" = dlpreopen; then
-	# Link the dlpreopened libraries before other libraries
-	for deplib in $save_deplibs; do
-	  deplibs="$deplib $deplibs"
-	done
-      fi
-      if test "$pass" != dlopen; then
-	if test "$pass" != conv; then
-	  # Make sure lib_search_path contains only unique directories.
-	  lib_search_path=
-	  for dir in $newlib_search_path; do
-	    case "$lib_search_path " in
-	    *" $dir "*) ;;
-	    *) func_append lib_search_path " $dir" ;;
-	    esac
-	  done
-	  newlib_search_path=
-	fi
-
-	if test "$linkmode,$pass" != "prog,link"; then
-	  vars="deplibs"
-	else
-	  vars="compile_deplibs finalize_deplibs"
-	fi
-	for var in $vars dependency_libs; do
-	  # Add libraries to $var in reverse order
-	  eval tmp_libs=\"\$$var\"
-	  new_libs=
-	  for deplib in $tmp_libs; do
-	    # FIXME: Pedantically, this is the right thing to do, so
-	    #        that some nasty dependency loop isn't accidentally
-	    #        broken:
-	    #new_libs="$deplib $new_libs"
-	    # Pragmatically, this seems to cause very few problems in
-	    # practice:
-	    case $deplib in
-	    -L*) new_libs="$deplib $new_libs" ;;
-	    -R*) ;;
-	    *)
-	      # And here is the reason: when a library appears more
-	      # than once as an explicit dependence of a library, or
-	      # is implicitly linked in more than once by the
-	      # compiler, it is considered special, and multiple
-	      # occurrences thereof are not removed.  Compare this
-	      # with having the same library being listed as a
-	      # dependency of multiple other libraries: in this case,
-	      # we know (pedantically, we assume) the library does not
-	      # need to be listed more than once, so we keep only the
-	      # last copy.  This is not always right, but it is rare
-	      # enough that we require users that really mean to play
-	      # such unportable linking tricks to link the library
-	      # using -Wl,-lname, so that libtool does not consider it
-	      # for duplicate removal.
-	      case " $specialdeplibs " in
-	      *" $deplib "*) new_libs="$deplib $new_libs" ;;
-	      *)
-		case " $new_libs " in
-		*" $deplib "*) ;;
-		*) new_libs="$deplib $new_libs" ;;
-		esac
-		;;
-	      esac
-	      ;;
-	    esac
-	  done
-	  tmp_libs=
-	  for deplib in $new_libs; do
-	    case $deplib in
-	    -L*)
-	      case " $tmp_libs " in
-	      *" $deplib "*) ;;
-	      *) func_append tmp_libs " $deplib" ;;
-	      esac
-	      ;;
-	    *) func_append tmp_libs " $deplib" ;;
-	    esac
-	  done
-	  eval $var=\"$tmp_libs\"
-	done # for var
-      fi
-      # Last step: remove runtime libs from dependency_libs
-      # (they stay in deplibs)
-      tmp_libs=
-      for i in $dependency_libs ; do
-	case " $predeps $postdeps $compiler_lib_search_path " in
-	*" $i "*)
-	  i=""
-	  ;;
-	esac
-	if test -n "$i" ; then
-	  func_append tmp_libs " $i"
-	fi
-      done
-      dependency_libs=$tmp_libs
-    done # for pass
-    if test "$linkmode" = prog; then
-      dlfiles="$newdlfiles"
-    fi
-    if test "$linkmode" = prog || test "$linkmode" = lib; then
-      dlprefiles="$newdlprefiles"
-    fi
-
-    case $linkmode in
-    oldlib)
-      if test -n "$dlfiles$dlprefiles" || test "$dlself" != no; then
-	func_warning "\`-dlopen' is ignored for archives"
-      fi
-
-      case " $deplibs" in
-      *\ -l* | *\ -L*)
-	func_warning "\`-l' and \`-L' are ignored for archives" ;;
-      esac
-
-      test -n "$rpath" && \
-	func_warning "\`-rpath' is ignored for archives"
-
-      test -n "$xrpath" && \
-	func_warning "\`-R' is ignored for archives"
-
-      test -n "$vinfo" && \
-	func_warning "\`-version-info/-version-number' is ignored for archives"
-
-      test -n "$release" && \
-	func_warning "\`-release' is ignored for archives"
-
-      test -n "$export_symbols$export_symbols_regex" && \
-	func_warning "\`-export-symbols' is ignored for archives"
-
-      # Now set the variables for building old libraries.
-      build_libtool_libs=no
-      oldlibs="$output"
-      func_append objs "$old_deplibs"
-      ;;
-
-    lib)
-      # Make sure we only generate libraries of the form `libNAME.la'.
-      case $outputname in
-      lib*)
-	func_stripname 'lib' '.la' "$outputname"
-	name=$func_stripname_result
-	eval shared_ext=\"$shrext_cmds\"
-	eval libname=\"$libname_spec\"
-	;;
-      *)
-	test "$module" = no && \
-	  func_fatal_help "libtool library \`$output' must begin with \`lib'"
-
-	if test "$need_lib_prefix" != no; then
-	  # Add the "lib" prefix for modules if required
-	  func_stripname '' '.la' "$outputname"
-	  name=$func_stripname_result
-	  eval shared_ext=\"$shrext_cmds\"
-	  eval libname=\"$libname_spec\"
-	else
-	  func_stripname '' '.la' "$outputname"
-	  libname=$func_stripname_result
-	fi
-	;;
-      esac
-
-      if test -n "$objs"; then
-	if test "$deplibs_check_method" != pass_all; then
-	  func_fatal_error "cannot build libtool library \`$output' from non-libtool objects on this host:$objs"
-	else
-	  echo
-	  $ECHO "*** Warning: Linking the shared library $output against the non-libtool"
-	  $ECHO "*** objects $objs is not portable!"
-	  func_append libobjs " $objs"
-	fi
-      fi
-
-      test "$dlself" != no && \
-	func_warning "\`-dlopen self' is ignored for libtool libraries"
-
-      set dummy $rpath
-      shift
-      test "$#" -gt 1 && \
-	func_warning "ignoring multiple \`-rpath's for a libtool library"
-
-      install_libdir="$1"
-
-      oldlibs=
-      if test -z "$rpath"; then
-	if test "$build_libtool_libs" = yes; then
-	  # Building a libtool convenience library.
-	  # Some compilers have problems with a `.al' extension so
-	  # convenience libraries should have the same extension an
-	  # archive normally would.
-	  oldlibs="$output_objdir/$libname.$libext $oldlibs"
-	  build_libtool_libs=convenience
-	  build_old_libs=yes
-	fi
-
-	test -n "$vinfo" && \
-	  func_warning "\`-version-info/-version-number' is ignored for convenience libraries"
-
-	test -n "$release" && \
-	  func_warning "\`-release' is ignored for convenience libraries"
-      else
-
-	# Parse the version information argument.
-	save_ifs="$IFS"; IFS=':'
-	set dummy $vinfo 0 0 0
-	shift
-	IFS="$save_ifs"
-
-	test -n "$7" && \
-	  func_fatal_help "too many parameters to \`-version-info'"
-
-	# convert absolute version numbers to libtool ages
-	# this retains compatibility with .la files and attempts
-	# to make the code below a bit more comprehensible
-
-	case $vinfo_number in
-	yes)
-	  number_major="$1"
-	  number_minor="$2"
-	  number_revision="$3"
-	  #
-	  # There are really only two kinds -- those that
-	  # use the current revision as the major version
-	  # and those that subtract age and use age as
-	  # a minor version.  But, then there is irix
-	  # which has an extra 1 added just for fun
-	  #
-	  case $version_type in
-	  # correct linux to gnu/linux during the next big refactor
-	  darwin|linux|osf|windows|none)
-	    func_arith $number_major + $number_minor
-	    current=$func_arith_result
-	    age="$number_minor"
-	    revision="$number_revision"
-	    ;;
-	  freebsd-aout|freebsd-elf|qnx|sunos)
-	    current="$number_major"
-	    revision="$number_minor"
-	    age="0"
-	    ;;
-	  irix|nonstopux)
-	    func_arith $number_major + $number_minor
-	    current=$func_arith_result
-	    age="$number_minor"
-	    revision="$number_minor"
-	    lt_irix_increment=no
-	    ;;
-	  esac
-	  ;;
-	no)
-	  current="$1"
-	  revision="$2"
-	  age="$3"
-	  ;;
-	esac
-
-	# Check that each of the things are valid numbers.
-	case $current in
-	0|[1-9]|[1-9][0-9]|[1-9][0-9][0-9]|[1-9][0-9][0-9][0-9]|[1-9][0-9][0-9][0-9][0-9]) ;;
-	*)
-	  func_error "CURRENT \`$current' must be a nonnegative integer"
-	  func_fatal_error "\`$vinfo' is not valid version information"
-	  ;;
-	esac
-
-	case $revision in
-	0|[1-9]|[1-9][0-9]|[1-9][0-9][0-9]|[1-9][0-9][0-9][0-9]|[1-9][0-9][0-9][0-9][0-9]) ;;
-	*)
-	  func_error "REVISION \`$revision' must be a nonnegative integer"
-	  func_fatal_error "\`$vinfo' is not valid version information"
-	  ;;
-	esac
-
-	case $age in
-	0|[1-9]|[1-9][0-9]|[1-9][0-9][0-9]|[1-9][0-9][0-9][0-9]|[1-9][0-9][0-9][0-9][0-9]) ;;
-	*)
-	  func_error "AGE \`$age' must be a nonnegative integer"
-	  func_fatal_error "\`$vinfo' is not valid version information"
-	  ;;
-	esac
-
-	if test "$age" -gt "$current"; then
-	  func_error "AGE \`$age' is greater than the current interface number \`$current'"
-	  func_fatal_error "\`$vinfo' is not valid version information"
-	fi
-
-	# Calculate the version variables.
-	major=
-	versuffix=
-	verstring=
-	case $version_type in
-	none) ;;
-
-	darwin)
-	  # Like Linux, but with the current version available in
-	  # verstring for coding it into the library header
-	  func_arith $current - $age
-	  major=.$func_arith_result
-	  versuffix="$major.$age.$revision"
-	  # Darwin ld doesn't like 0 for these options...
-	  func_arith $current + 1
-	  minor_current=$func_arith_result
-	  xlcverstring="${wl}-compatibility_version ${wl}$minor_current ${wl}-current_version ${wl}$minor_current.$revision"
-	  verstring="-compatibility_version $minor_current -current_version $minor_current.$revision"
-	  ;;
-
-	freebsd-aout)
-	  major=".$current"
-	  versuffix=".$current.$revision";
-	  ;;
-
-	freebsd-elf)
-	  major=".$current"
-	  versuffix=".$current"
-	  ;;
-
-	irix | nonstopux)
-	  if test "X$lt_irix_increment" = "Xno"; then
-	    func_arith $current - $age
-	  else
-	    func_arith $current - $age + 1
-	  fi
-	  major=$func_arith_result
-
-	  case $version_type in
-	    nonstopux) verstring_prefix=nonstopux ;;
-	    *)         verstring_prefix=sgi ;;
-	  esac
-	  verstring="$verstring_prefix$major.$revision"
-
-	  # Add in all the interfaces that we are compatible with.
-	  loop=$revision
-	  while test "$loop" -ne 0; do
-	    func_arith $revision - $loop
-	    iface=$func_arith_result
-	    func_arith $loop - 1
-	    loop=$func_arith_result
-	    verstring="$verstring_prefix$major.$iface:$verstring"
-	  done
-
-	  # Before this point, $major must not contain `.'.
-	  major=.$major
-	  versuffix="$major.$revision"
-	  ;;
-
-	linux) # correct to gnu/linux during the next big refactor
-	  func_arith $current - $age
-	  major=.$func_arith_result
-	  versuffix="$major.$age.$revision"
-	  ;;
-
-	osf)
-	  func_arith $current - $age
-	  major=.$func_arith_result
-	  versuffix=".$current.$age.$revision"
-	  verstring="$current.$age.$revision"
-
-	  # Add in all the interfaces that we are compatible with.
-	  loop=$age
-	  while test "$loop" -ne 0; do
-	    func_arith $current - $loop
-	    iface=$func_arith_result
-	    func_arith $loop - 1
-	    loop=$func_arith_result
-	    verstring="$verstring:${iface}.0"
-	  done
-
-	  # Make executables depend on our current version.
-	  func_append verstring ":${current}.0"
-	  ;;
-
-	qnx)
-	  major=".$current"
-	  versuffix=".$current"
-	  ;;
-
-	sunos)
-	  major=".$current"
-	  versuffix=".$current.$revision"
-	  ;;
-
-	windows)
-	  # Use '-' rather than '.', since we only want one
-	  # extension on DOS 8.3 filesystems.
-	  func_arith $current - $age
-	  major=$func_arith_result
-	  versuffix="-$major"
-	  ;;
-
-	*)
-	  func_fatal_configuration "unknown library version type \`$version_type'"
-	  ;;
-	esac
-
-	# Clear the version info if we defaulted, and they specified a release.
-	if test -z "$vinfo" && test -n "$release"; then
-	  major=
-	  case $version_type in
-	  darwin)
-	    # we can't check for "0.0" in archive_cmds due to quoting
-	    # problems, so we reset it completely
-	    verstring=
-	    ;;
-	  *)
-	    verstring="0.0"
-	    ;;
-	  esac
-	  if test "$need_version" = no; then
-	    versuffix=
-	  else
-	    versuffix=".0.0"
-	  fi
-	fi
-
-	# Remove version info from name if versioning should be avoided
-	if test "$avoid_version" = yes && test "$need_version" = no; then
-	  major=
-	  versuffix=
-	  verstring=""
-	fi
-
-	# Check to see if the archive will have undefined symbols.
-	if test "$allow_undefined" = yes; then
-	  if test "$allow_undefined_flag" = unsupported; then
-	    func_warning "undefined symbols not allowed in $host shared libraries"
-	    build_libtool_libs=no
-	    build_old_libs=yes
-	  fi
-	else
-	  # Don't allow undefined symbols.
-	  allow_undefined_flag="$no_undefined_flag"
-	fi
-
-      fi
-
-      func_generate_dlsyms "$libname" "$libname" "yes"
-      func_append libobjs " $symfileobj"
-      test "X$libobjs" = "X " && libobjs=
-
-      if test "$opt_mode" != relink; then
-	# Remove our outputs, but don't remove object files since they
-	# may have been created when compiling PIC objects.
-	removelist=
-	tempremovelist=`$ECHO "$output_objdir/*"`
-	for p in $tempremovelist; do
-	  case $p in
-	    *.$objext | *.gcno)
-	       ;;
-	    $output_objdir/$outputname | $output_objdir/$libname.* | $output_objdir/${libname}${release}.*)
-	       if test "X$precious_files_regex" != "X"; then
-		 if $ECHO "$p" | $EGREP -e "$precious_files_regex" >/dev/null 2>&1
-		 then
-		   continue
-		 fi
-	       fi
-	       func_append removelist " $p"
-	       ;;
-	    *) ;;
-	  esac
-	done
-	test -n "$removelist" && \
-	  func_show_eval "${RM}r \$removelist"
-      fi
-
-      # Now set the variables for building old libraries.
-      if test "$build_old_libs" = yes && test "$build_libtool_libs" != convenience ; then
-	func_append oldlibs " $output_objdir/$libname.$libext"
-
-	# Transform .lo files to .o files.
-	oldobjs="$objs "`$ECHO "$libobjs" | $SP2NL | $SED "/\.${libext}$/d; $lo2o" | $NL2SP`
-      fi
-
-      # Eliminate all temporary directories.
-      #for path in $notinst_path; do
-      #	lib_search_path=`$ECHO "$lib_search_path " | $SED "s% $path % %g"`
-      #	deplibs=`$ECHO "$deplibs " | $SED "s% -L$path % %g"`
-      #	dependency_libs=`$ECHO "$dependency_libs " | $SED "s% -L$path % %g"`
-      #done
-
-      if test -n "$xrpath"; then
-	# If the user specified any rpath flags, then add them.
-	temp_xrpath=
-	for libdir in $xrpath; do
-	  func_replace_sysroot "$libdir"
-	  func_append temp_xrpath " -R$func_replace_sysroot_result"
-	  case "$finalize_rpath " in
-	  *" $libdir "*) ;;
-	  *) func_append finalize_rpath " $libdir" ;;
-	  esac
-	done
-	if test "$hardcode_into_libs" != yes || test "$build_old_libs" = yes; then
-	  dependency_libs="$temp_xrpath $dependency_libs"
-	fi
-      fi
-
-      # Make sure dlfiles contains only unique files that won't be dlpreopened
-      old_dlfiles="$dlfiles"
-      dlfiles=
-      for lib in $old_dlfiles; do
-	case " $dlprefiles $dlfiles " in
-	*" $lib "*) ;;
-	*) func_append dlfiles " $lib" ;;
-	esac
-      done
-
-      # Make sure dlprefiles contains only unique files
-      old_dlprefiles="$dlprefiles"
-      dlprefiles=
-      for lib in $old_dlprefiles; do
-	case "$dlprefiles " in
-	*" $lib "*) ;;
-	*) func_append dlprefiles " $lib" ;;
-	esac
-      done
-
-      if test "$build_libtool_libs" = yes; then
-	if test -n "$rpath"; then
-	  case $host in
-	  *-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-os2* | *-*-beos* | *-cegcc* | *-*-haiku*)
-	    # these systems don't actually have a c library (as such)!
-	    ;;
-	  *-*-rhapsody* | *-*-darwin1.[012])
-	    # Rhapsody C library is in the System framework
-	    func_append deplibs " System.ltframework"
-	    ;;
-	  *-*-netbsd*)
-	    # Don't link with libc until the a.out ld.so is fixed.
-	    ;;
-	  *-*-openbsd* | *-*-freebsd* | *-*-dragonfly*)
-	    # Do not include libc due to us having libc/libc_r.
-	    ;;
-	  *-*-sco3.2v5* | *-*-sco5v6*)
-	    # Causes problems with __ctype
-	    ;;
-	  *-*-sysv4.2uw2* | *-*-sysv5* | *-*-unixware* | *-*-OpenUNIX*)
-	    # Compiler inserts libc in the correct place for threads to work
-	    ;;
-	  *)
-	    # Add libc to deplibs on all other systems if necessary.
-	    if test "$build_libtool_need_lc" = "yes"; then
-	      func_append deplibs " -lc"
-	    fi
-	    ;;
-	  esac
-	fi
-
-	# Transform deplibs into only deplibs that can be linked in shared.
-	name_save=$name
-	libname_save=$libname
-	release_save=$release
-	versuffix_save=$versuffix
-	major_save=$major
-	# I'm not sure if I'm treating the release correctly.  I think
-	# release should show up in the -l (ie -lgmp5) so we don't want to
-	# add it in twice.  Is that correct?
-	release=""
-	versuffix=""
-	major=""
-	newdeplibs=
-	droppeddeps=no
-	case $deplibs_check_method in
-	pass_all)
-	  # Don't check for shared/static.  Everything works.
-	  # This might be a little naive.  We might want to check
-	  # whether the library exists or not.  But this is on
-	  # osf3 & osf4 and I'm not really sure... Just
-	  # implementing what was already the behavior.
-	  newdeplibs=$deplibs
-	  ;;
-	test_compile)
-	  # This code stresses the "libraries are programs" paradigm to its
-	  # limits. Maybe even breaks it.  We compile a program, linking it
-	  # against the deplibs as a proxy for the library.  Then we can check
-	  # whether they linked in statically or dynamically with ldd.
-	  $opt_dry_run || $RM conftest.c
-	  cat > conftest.c <<EOF
-	  int main() { return 0; }
-EOF
-	  $opt_dry_run || $RM conftest
-	  if $LTCC $LTCFLAGS -o conftest conftest.c $deplibs; then
-	    ldd_output=`ldd conftest`
-	    for i in $deplibs; do
-	      case $i in
-	      -l*)
-		func_stripname -l '' "$i"
-		name=$func_stripname_result
-		if test "X$allow_libtool_libs_with_static_runtimes" = "Xyes" ; then
-		  case " $predeps $postdeps " in
-		  *" $i "*)
-		    func_append newdeplibs " $i"
-		    i=""
-		    ;;
-		  esac
-		fi
-		if test -n "$i" ; then
-		  libname=`eval "\\$ECHO \"$libname_spec\""`
-		  deplib_matches=`eval "\\$ECHO \"$library_names_spec\""`
-		  set dummy $deplib_matches; shift
-		  deplib_match=$1
-		  if test `expr "$ldd_output" : ".*$deplib_match"` -ne 0 ; then
-		    func_append newdeplibs " $i"
-		  else
-		    droppeddeps=yes
-		    echo
-		    $ECHO "*** Warning: dynamic linker does not accept needed library $i."
-		    echo "*** I have the capability to make that library automatically link in when"
-		    echo "*** you link to this library.  But I can only do this if you have a"
-		    echo "*** shared version of the library, which I believe you do not have"
-		    echo "*** because a test_compile did reveal that the linker did not use it for"
-		    echo "*** its dynamic dependency list that programs get resolved with at runtime."
-		  fi
-		fi
-		;;
-	      *)
-		func_append newdeplibs " $i"
-		;;
-	      esac
-	    done
-	  else
-	    # Error occurred in the first compile.  Let's try to salvage
-	    # the situation: Compile a separate program for each library.
-	    for i in $deplibs; do
-	      case $i in
-	      -l*)
-		func_stripname -l '' "$i"
-		name=$func_stripname_result
-		$opt_dry_run || $RM conftest
-		if $LTCC $LTCFLAGS -o conftest conftest.c $i; then
-		  ldd_output=`ldd conftest`
-		  if test "X$allow_libtool_libs_with_static_runtimes" = "Xyes" ; then
-		    case " $predeps $postdeps " in
-		    *" $i "*)
-		      func_append newdeplibs " $i"
-		      i=""
-		      ;;
-		    esac
-		  fi
-		  if test -n "$i" ; then
-		    libname=`eval "\\$ECHO \"$libname_spec\""`
-		    deplib_matches=`eval "\\$ECHO \"$library_names_spec\""`
-		    set dummy $deplib_matches; shift
-		    deplib_match=$1
-		    if test `expr "$ldd_output" : ".*$deplib_match"` -ne 0 ; then
-		      func_append newdeplibs " $i"
-		    else
-		      droppeddeps=yes
-		      echo
-		      $ECHO "*** Warning: dynamic linker does not accept needed library $i."
-		      echo "*** I have the capability to make that library automatically link in when"
-		      echo "*** you link to this library.  But I can only do this if you have a"
-		      echo "*** shared version of the library, which you do not appear to have"
-		      echo "*** because a test_compile did reveal that the linker did not use this one"
-		      echo "*** as a dynamic dependency that programs can get resolved with at runtime."
-		    fi
-		  fi
-		else
-		  droppeddeps=yes
-		  echo
-		  $ECHO "*** Warning!  Library $i is needed by this library but I was not able to"
-		  echo "*** make it link in!  You will probably need to install it or some"
-		  echo "*** library that it depends on before this library will be fully"
-		  echo "*** functional.  Installing it before continuing would be even better."
-		fi
-		;;
-	      *)
-		func_append newdeplibs " $i"
-		;;
-	      esac
-	    done
-	  fi
-	  ;;
-	file_magic*)
-	  set dummy $deplibs_check_method; shift
-	  file_magic_regex=`expr "$deplibs_check_method" : "$1 \(.*\)"`
-	  for a_deplib in $deplibs; do
-	    case $a_deplib in
-	    -l*)
-	      func_stripname -l '' "$a_deplib"
-	      name=$func_stripname_result
-	      if test "X$allow_libtool_libs_with_static_runtimes" = "Xyes" ; then
-		case " $predeps $postdeps " in
-		*" $a_deplib "*)
-		  func_append newdeplibs " $a_deplib"
-		  a_deplib=""
-		  ;;
-		esac
-	      fi
-	      if test -n "$a_deplib" ; then
-		libname=`eval "\\$ECHO \"$libname_spec\""`
-		if test -n "$file_magic_glob"; then
-		  libnameglob=`func_echo_all "$libname" | $SED -e $file_magic_glob`
-		else
-		  libnameglob=$libname
-		fi
-		test "$want_nocaseglob" = yes && nocaseglob=`shopt -p nocaseglob`
-		for i in $lib_search_path $sys_lib_search_path $shlib_search_path; do
-		  if test "$want_nocaseglob" = yes; then
-		    shopt -s nocaseglob
-		    potential_libs=`ls $i/$libnameglob[.-]* 2>/dev/null`
-		    $nocaseglob
-		  else
-		    potential_libs=`ls $i/$libnameglob[.-]* 2>/dev/null`
-		  fi
-		  for potent_lib in $potential_libs; do
-		      # Follow soft links.
-		      if ls -lLd "$potent_lib" 2>/dev/null |
-			 $GREP " -> " >/dev/null; then
-			continue
-		      fi
-		      # The statement above tries to avoid entering an
-		      # endless loop below, in case of cyclic links.
-		      # We might still enter an endless loop, since a link
-		      # loop can be closed while we follow links,
-		      # but so what?
-		      potlib="$potent_lib"
-		      while test -h "$potlib" 2>/dev/null; do
-			potliblink=`ls -ld $potlib | ${SED} 's/.* -> //'`
-			case $potliblink in
-			[\\/]* | [A-Za-z]:[\\/]*) potlib="$potliblink";;
-			*) potlib=`$ECHO "$potlib" | $SED 's,[^/]*$,,'`"$potliblink";;
-			esac
-		      done
-		      if eval $file_magic_cmd \"\$potlib\" 2>/dev/null |
-			 $SED -e 10q |
-			 $EGREP "$file_magic_regex" > /dev/null; then
-			func_append newdeplibs " $a_deplib"
-			a_deplib=""
-			break 2
-		      fi
-		  done
-		done
-	      fi
-	      if test -n "$a_deplib" ; then
-		droppeddeps=yes
-		echo
-		$ECHO "*** Warning: linker path does not have real file for library $a_deplib."
-		echo "*** I have the capability to make that library automatically link in when"
-		echo "*** you link to this library.  But I can only do this if you have a"
-		echo "*** shared version of the library, which you do not appear to have"
-		echo "*** because I did check the linker path looking for a file starting"
-		if test -z "$potlib" ; then
-		  $ECHO "*** with $libname but no candidates were found. (...for file magic test)"
-		else
-		  $ECHO "*** with $libname and none of the candidates passed a file format test"
-		  $ECHO "*** using a file magic. Last file checked: $potlib"
-		fi
-	      fi
-	      ;;
-	    *)
-	      # Add a -L argument.
-	      func_append newdeplibs " $a_deplib"
-	      ;;
-	    esac
-	  done # Gone through all deplibs.
-	  ;;
-	match_pattern*)
-	  set dummy $deplibs_check_method; shift
-	  match_pattern_regex=`expr "$deplibs_check_method" : "$1 \(.*\)"`
-	  for a_deplib in $deplibs; do
-	    case $a_deplib in
-	    -l*)
-	      func_stripname -l '' "$a_deplib"
-	      name=$func_stripname_result
-	      if test "X$allow_libtool_libs_with_static_runtimes" = "Xyes" ; then
-		case " $predeps $postdeps " in
-		*" $a_deplib "*)
-		  func_append newdeplibs " $a_deplib"
-		  a_deplib=""
-		  ;;
-		esac
-	      fi
-	      if test -n "$a_deplib" ; then
-		libname=`eval "\\$ECHO \"$libname_spec\""`
-		for i in $lib_search_path $sys_lib_search_path $shlib_search_path; do
-		  potential_libs=`ls $i/$libname[.-]* 2>/dev/null`
-		  for potent_lib in $potential_libs; do
-		    potlib="$potent_lib" # see symlink-check above in file_magic test
-		    if eval "\$ECHO \"$potent_lib\"" 2>/dev/null | $SED 10q | \
-		       $EGREP "$match_pattern_regex" > /dev/null; then
-		      func_append newdeplibs " $a_deplib"
-		      a_deplib=""
-		      break 2
-		    fi
-		  done
-		done
-	      fi
-	      if test -n "$a_deplib" ; then
-		droppeddeps=yes
-		echo
-		$ECHO "*** Warning: linker path does not have real file for library $a_deplib."
-		echo "*** I have the capability to make that library automatically link in when"
-		echo "*** you link to this library.  But I can only do this if you have a"
-		echo "*** shared version of the library, which you do not appear to have"
-		echo "*** because I did check the linker path looking for a file starting"
-		if test -z "$potlib" ; then
-		  $ECHO "*** with $libname but no candidates were found. (...for regex pattern test)"
-		else
-		  $ECHO "*** with $libname and none of the candidates passed a file format test"
-		  $ECHO "*** using a regex pattern. Last file checked: $potlib"
-		fi
-	      fi
-	      ;;
-	    *)
-	      # Add a -L argument.
-	      func_append newdeplibs " $a_deplib"
-	      ;;
-	    esac
-	  done # Gone through all deplibs.
-	  ;;
-	none | unknown | *)
-	  newdeplibs=""
-	  tmp_deplibs=`$ECHO " $deplibs" | $SED 's/ -lc$//; s/ -[LR][^ ]*//g'`
-	  if test "X$allow_libtool_libs_with_static_runtimes" = "Xyes" ; then
-	    for i in $predeps $postdeps ; do
-	      # can't use Xsed below, because $i might contain '/'
-	      tmp_deplibs=`$ECHO " $tmp_deplibs" | $SED "s,$i,,"`
-	    done
-	  fi
-	  case $tmp_deplibs in
-	  *[!\	\ ]*)
-	    echo
-	    if test "X$deplibs_check_method" = "Xnone"; then
-	      echo "*** Warning: inter-library dependencies are not supported in this platform."
-	    else
-	      echo "*** Warning: inter-library dependencies are not known to be supported."
-	    fi
-	    echo "*** All declared inter-library dependencies are being dropped."
-	    droppeddeps=yes
-	    ;;
-	  esac
-	  ;;
-	esac
-	versuffix=$versuffix_save
-	major=$major_save
-	release=$release_save
-	libname=$libname_save
-	name=$name_save
-
-	case $host in
-	*-*-rhapsody* | *-*-darwin1.[012])
-	  # On Rhapsody replace the C library with the System framework
-	  newdeplibs=`$ECHO " $newdeplibs" | $SED 's/ -lc / System.ltframework /'`
-	  ;;
-	esac
-
-	if test "$droppeddeps" = yes; then
-	  if test "$module" = yes; then
-	    echo
-	    echo "*** Warning: libtool could not satisfy all declared inter-library"
-	    $ECHO "*** dependencies of module $libname.  Therefore, libtool will create"
-	    echo "*** a static module, that should work as long as the dlopening"
-	    echo "*** application is linked with the -dlopen flag."
-	    if test -z "$global_symbol_pipe"; then
-	      echo
-	      echo "*** However, this would only work if libtool was able to extract symbol"
-	      echo "*** lists from a program, using \`nm' or equivalent, but libtool could"
-	      echo "*** not find such a program.  So, this module is probably useless."
-	      echo "*** \`nm' from GNU binutils and a full rebuild may help."
-	    fi
-	    if test "$build_old_libs" = no; then
-	      oldlibs="$output_objdir/$libname.$libext"
-	      build_libtool_libs=module
-	      build_old_libs=yes
-	    else
-	      build_libtool_libs=no
-	    fi
-	  else
-	    echo "*** The inter-library dependencies that have been dropped here will be"
-	    echo "*** automatically added whenever a program is linked with this library"
-	    echo "*** or is declared to -dlopen it."
-
-	    if test "$allow_undefined" = no; then
-	      echo
-	      echo "*** Since this library must not contain undefined symbols,"
-	      echo "*** because either the platform does not support them or"
-	      echo "*** it was explicitly requested with -no-undefined,"
-	      echo "*** libtool will only create a static version of it."
-	      if test "$build_old_libs" = no; then
-		oldlibs="$output_objdir/$libname.$libext"
-		build_libtool_libs=module
-		build_old_libs=yes
-	      else
-		build_libtool_libs=no
-	      fi
-	    fi
-	  fi
-	fi
-	# Done checking deplibs!
-	deplibs=$newdeplibs
-      fi
-      # Time to change all our "foo.ltframework" stuff back to "-framework foo"
-      case $host in
-	*-*-darwin*)
-	  newdeplibs=`$ECHO " $newdeplibs" | $SED 's% \([^ $]*\).ltframework% -framework \1%g'`
-	  new_inherited_linker_flags=`$ECHO " $new_inherited_linker_flags" | $SED 's% \([^ $]*\).ltframework% -framework \1%g'`
-	  deplibs=`$ECHO " $deplibs" | $SED 's% \([^ $]*\).ltframework% -framework \1%g'`
-	  ;;
-      esac
-
-      # move library search paths that coincide with paths to not yet
-      # installed libraries to the beginning of the library search list
-      new_libs=
-      for path in $notinst_path; do
-	case " $new_libs " in
-	*" -L$path/$objdir "*) ;;
-	*)
-	  case " $deplibs " in
-	  *" -L$path/$objdir "*)
-	    func_append new_libs " -L$path/$objdir" ;;
-	  esac
-	  ;;
-	esac
-      done
-      for deplib in $deplibs; do
-	case $deplib in
-	-L*)
-	  case " $new_libs " in
-	  *" $deplib "*) ;;
-	  *) func_append new_libs " $deplib" ;;
-	  esac
-	  ;;
-	*) func_append new_libs " $deplib" ;;
-	esac
-      done
-      deplibs="$new_libs"
-
-      # All the library-specific variables (install_libdir is set above).
-      library_names=
-      old_library=
-      dlname=
-
-      # Test again, we may have decided not to build it any more
-      if test "$build_libtool_libs" = yes; then
-	# Remove ${wl} instances when linking with ld.
-	# FIXME: should test the right _cmds variable.
-	case $archive_cmds in
-	  *\$LD\ *) wl= ;;
-        esac
-	if test "$hardcode_into_libs" = yes; then
-	  # Hardcode the library paths
-	  hardcode_libdirs=
-	  dep_rpath=
-	  rpath="$finalize_rpath"
-	  test "$opt_mode" != relink && rpath="$compile_rpath$rpath"
-	  for libdir in $rpath; do
-	    if test -n "$hardcode_libdir_flag_spec"; then
-	      if test -n "$hardcode_libdir_separator"; then
-		func_replace_sysroot "$libdir"
-		libdir=$func_replace_sysroot_result
-		if test -z "$hardcode_libdirs"; then
-		  hardcode_libdirs="$libdir"
-		else
-		  # Just accumulate the unique libdirs.
-		  case $hardcode_libdir_separator$hardcode_libdirs$hardcode_libdir_separator in
-		  *"$hardcode_libdir_separator$libdir$hardcode_libdir_separator"*)
-		    ;;
-		  *)
-		    func_append hardcode_libdirs "$hardcode_libdir_separator$libdir"
-		    ;;
-		  esac
-		fi
-	      else
-		eval flag=\"$hardcode_libdir_flag_spec\"
-		func_append dep_rpath " $flag"
-	      fi
-	    elif test -n "$runpath_var"; then
-	      case "$perm_rpath " in
-	      *" $libdir "*) ;;
-	      *) func_append perm_rpath " $libdir" ;;
-	      esac
-	    fi
-	  done
-	  # Substitute the hardcoded libdirs into the rpath.
-	  if test -n "$hardcode_libdir_separator" &&
-	     test -n "$hardcode_libdirs"; then
-	    libdir="$hardcode_libdirs"
-	    eval "dep_rpath=\"$hardcode_libdir_flag_spec\""
-	  fi
-	  if test -n "$runpath_var" && test -n "$perm_rpath"; then
-	    # We should set the runpath_var.
-	    rpath=
-	    for dir in $perm_rpath; do
-	      func_append rpath "$dir:"
-	    done
-	    eval "$runpath_var='$rpath\$$runpath_var'; export $runpath_var"
-	  fi
-	  test -n "$dep_rpath" && deplibs="$dep_rpath $deplibs"
-	fi
-
-	shlibpath="$finalize_shlibpath"
-	test "$opt_mode" != relink && shlibpath="$compile_shlibpath$shlibpath"
-	if test -n "$shlibpath"; then
-	  eval "$shlibpath_var='$shlibpath\$$shlibpath_var'; export $shlibpath_var"
-	fi
-
-	# Get the real and link names of the library.
-	eval shared_ext=\"$shrext_cmds\"
-	eval library_names=\"$library_names_spec\"
-	set dummy $library_names
-	shift
-	realname="$1"
-	shift
-
-	if test -n "$soname_spec"; then
-	  eval soname=\"$soname_spec\"
-	else
-	  soname="$realname"
-	fi
-	if test -z "$dlname"; then
-	  dlname=$soname
-	fi
-
-	lib="$output_objdir/$realname"
-	linknames=
-	for link
-	do
-	  func_append linknames " $link"
-	done
-
-	# Use standard objects if they are pic
-	test -z "$pic_flag" && libobjs=`$ECHO "$libobjs" | $SP2NL | $SED "$lo2o" | $NL2SP`
-	test "X$libobjs" = "X " && libobjs=
-
-	delfiles=
-	if test -n "$export_symbols" && test -n "$include_expsyms"; then
-	  $opt_dry_run || cp "$export_symbols" "$output_objdir/$libname.uexp"
-	  export_symbols="$output_objdir/$libname.uexp"
-	  func_append delfiles " $export_symbols"
-	fi
-
-	orig_export_symbols=
-	case $host_os in
-	cygwin* | mingw* | cegcc*)
-	  if test -n "$export_symbols" && test -z "$export_symbols_regex"; then
-	    # exporting using user supplied symfile
-	    if test "x`$SED 1q $export_symbols`" != xEXPORTS; then
-	      # and it's NOT already a .def file. Must figure out
-	      # which of the given symbols are data symbols and tag
-	      # them as such. So, trigger use of export_symbols_cmds.
-	      # export_symbols gets reassigned inside the "prepare
-	      # the list of exported symbols" if statement, so the
-	      # include_expsyms logic still works.
-	      orig_export_symbols="$export_symbols"
-	      export_symbols=
-	      always_export_symbols=yes
-	    fi
-	  fi
-	  ;;
-	esac
-
-	# Prepare the list of exported symbols
-	if test -z "$export_symbols"; then
-	  if test "$always_export_symbols" = yes || test -n "$export_symbols_regex"; then
-	    func_verbose "generating symbol list for \`$libname.la'"
-	    export_symbols="$output_objdir/$libname.exp"
-	    $opt_dry_run || $RM $export_symbols
-	    cmds=$export_symbols_cmds
-	    save_ifs="$IFS"; IFS='~'
-	    for cmd1 in $cmds; do
-	      IFS="$save_ifs"
-	      # Take the normal branch if the nm_file_list_spec branch
-	      # doesn't work or if tool conversion is not needed.
-	      case $nm_file_list_spec~$to_tool_file_cmd in
-		*~func_convert_file_noop | *~func_convert_file_msys_to_w32 | ~*)
-		  try_normal_branch=yes
-		  eval cmd=\"$cmd1\"
-		  func_len " $cmd"
-		  len=$func_len_result
-		  ;;
-		*)
-		  try_normal_branch=no
-		  ;;
-	      esac
-	      if test "$try_normal_branch" = yes \
-		 && { test "$len" -lt "$max_cmd_len" \
-		      || test "$max_cmd_len" -le -1; }
-	      then
-		func_show_eval "$cmd" 'exit $?'
-		skipped_export=false
-	      elif test -n "$nm_file_list_spec"; then
-		func_basename "$output"
-		output_la=$func_basename_result
-		save_libobjs=$libobjs
-		save_output=$output
-		output=${output_objdir}/${output_la}.nm
-		func_to_tool_file "$output"
-		libobjs=$nm_file_list_spec$func_to_tool_file_result
-		func_append delfiles " $output"
-		func_verbose "creating $NM input file list: $output"
-		for obj in $save_libobjs; do
-		  func_to_tool_file "$obj"
-		  $ECHO "$func_to_tool_file_result"
-		done > "$output"
-		eval cmd=\"$cmd1\"
-		func_show_eval "$cmd" 'exit $?'
-		output=$save_output
-		libobjs=$save_libobjs
-		skipped_export=false
-	      else
-		# The command line is too long to execute in one step.
-		func_verbose "using reloadable object file for export list..."
-		skipped_export=:
-		# Break out early, otherwise skipped_export may be
-		# set to false by a later but shorter cmd.
-		break
-	      fi
-	    done
-	    IFS="$save_ifs"
-	    if test -n "$export_symbols_regex" && test "X$skipped_export" != "X:"; then
-	      func_show_eval '$EGREP -e "$export_symbols_regex" "$export_symbols" > "${export_symbols}T"'
-	      func_show_eval '$MV "${export_symbols}T" "$export_symbols"'
-	    fi
-	  fi
-	fi
-
-	if test -n "$export_symbols" && test -n "$include_expsyms"; then
-	  tmp_export_symbols="$export_symbols"
-	  test -n "$orig_export_symbols" && tmp_export_symbols="$orig_export_symbols"
-	  $opt_dry_run || eval '$ECHO "$include_expsyms" | $SP2NL >> "$tmp_export_symbols"'
-	fi
-
-	if test "X$skipped_export" != "X:" && test -n "$orig_export_symbols"; then
-	  # The given exports_symbols file has to be filtered, so filter it.
-	  func_verbose "filter symbol list for \`$libname.la' to tag DATA exports"
-	  # FIXME: $output_objdir/$libname.filter potentially contains lots of
-	  # 's' commands which not all seds can handle. GNU sed should be fine
-	  # though. Also, the filter scales superlinearly with the number of
-	  # global variables. join(1) would be nice here, but unfortunately
-	  # isn't a blessed tool.
-	  $opt_dry_run || $SED -e '/[ ,]DATA/!d;s,\(.*\)\([ \,].*\),s|^\1$|\1\2|,' < $export_symbols > $output_objdir/$libname.filter
-	  func_append delfiles " $export_symbols $output_objdir/$libname.filter"
-	  export_symbols=$output_objdir/$libname.def
-	  $opt_dry_run || $SED -f $output_objdir/$libname.filter < $orig_export_symbols > $export_symbols
-	fi
-
-	tmp_deplibs=
-	for test_deplib in $deplibs; do
-	  case " $convenience " in
-	  *" $test_deplib "*) ;;
-	  *)
-	    func_append tmp_deplibs " $test_deplib"
-	    ;;
-	  esac
-	done
-	deplibs="$tmp_deplibs"
-
-	if test -n "$convenience"; then
-	  if test -n "$whole_archive_flag_spec" &&
-	    test "$compiler_needs_object" = yes &&
-	    test -z "$libobjs"; then
-	    # extract the archives, so we have objects to list.
-	    # TODO: could optimize this to just extract one archive.
-	    whole_archive_flag_spec=
-	  fi
-	  if test -n "$whole_archive_flag_spec"; then
-	    save_libobjs=$libobjs
-	    eval libobjs=\"\$libobjs $whole_archive_flag_spec\"
-	    test "X$libobjs" = "X " && libobjs=
-	  else
-	    gentop="$output_objdir/${outputname}x"
-	    func_append generated " $gentop"
-
-	    func_extract_archives $gentop $convenience
-	    func_append libobjs " $func_extract_archives_result"
-	    test "X$libobjs" = "X " && libobjs=
-	  fi
-	fi
-
-	if test "$thread_safe" = yes && test -n "$thread_safe_flag_spec"; then
-	  eval flag=\"$thread_safe_flag_spec\"
-	  func_append linker_flags " $flag"
-	fi
-
-	# Make a backup of the uninstalled library when relinking
-	if test "$opt_mode" = relink; then
-	  $opt_dry_run || eval '(cd $output_objdir && $RM ${realname}U && $MV $realname ${realname}U)' || exit $?
-	fi
-
-	# Do each of the archive commands.
-	if test "$module" = yes && test -n "$module_cmds" ; then
-	  if test -n "$export_symbols" && test -n "$module_expsym_cmds"; then
-	    eval test_cmds=\"$module_expsym_cmds\"
-	    cmds=$module_expsym_cmds
-	  else
-	    eval test_cmds=\"$module_cmds\"
-	    cmds=$module_cmds
-	  fi
-	else
-	  if test -n "$export_symbols" && test -n "$archive_expsym_cmds"; then
-	    eval test_cmds=\"$archive_expsym_cmds\"
-	    cmds=$archive_expsym_cmds
-	  else
-	    eval test_cmds=\"$archive_cmds\"
-	    cmds=$archive_cmds
-	  fi
-	fi
-
-	if test "X$skipped_export" != "X:" &&
-	   func_len " $test_cmds" &&
-	   len=$func_len_result &&
-	   test "$len" -lt "$max_cmd_len" || test "$max_cmd_len" -le -1; then
-	  :
-	else
-	  # The command line is too long to link in one step, link piecewise
-	  # or, if using GNU ld and skipped_export is not :, use a linker
-	  # script.
-
-	  # Save the value of $output and $libobjs because we want to
-	  # use them later.  If we have whole_archive_flag_spec, we
-	  # want to use save_libobjs as it was before
-	  # whole_archive_flag_spec was expanded, because we can't
-	  # assume the linker understands whole_archive_flag_spec.
-	  # This may have to be revisited, in case too many
-	  # convenience libraries get linked in and end up exceeding
-	  # the spec.
-	  if test -z "$convenience" || test -z "$whole_archive_flag_spec"; then
-	    save_libobjs=$libobjs
-	  fi
-	  save_output=$output
-	  func_basename "$output"
-	  output_la=$func_basename_result
-
-	  # Clear the reloadable object creation command queue and
-	  # initialize k to one.
-	  test_cmds=
-	  concat_cmds=
-	  objlist=
-	  last_robj=
-	  k=1
-
-	  if test -n "$save_libobjs" && test "X$skipped_export" != "X:" && test "$with_gnu_ld" = yes; then
-	    output=${output_objdir}/${output_la}.lnkscript
-	    func_verbose "creating GNU ld script: $output"
-	    echo 'INPUT (' > $output
-	    for obj in $save_libobjs
-	    do
-	      func_to_tool_file "$obj"
-	      $ECHO "$func_to_tool_file_result" >> $output
-	    done
-	    echo ')' >> $output
-	    func_append delfiles " $output"
-	    func_to_tool_file "$output"
-	    output=$func_to_tool_file_result
-	  elif test -n "$save_libobjs" && test "X$skipped_export" != "X:" && test "X$file_list_spec" != X; then
-	    output=${output_objdir}/${output_la}.lnk
-	    func_verbose "creating linker input file list: $output"
-	    : > $output
-	    set x $save_libobjs
-	    shift
-	    firstobj=
-	    if test "$compiler_needs_object" = yes; then
-	      firstobj="$1 "
-	      shift
-	    fi
-	    for obj
-	    do
-	      func_to_tool_file "$obj"
-	      $ECHO "$func_to_tool_file_result" >> $output
-	    done
-	    func_append delfiles " $output"
-	    func_to_tool_file "$output"
-	    output=$firstobj\"$file_list_spec$func_to_tool_file_result\"
-	  else
-	    if test -n "$save_libobjs"; then
-	      func_verbose "creating reloadable object files..."
-	      output=$output_objdir/$output_la-${k}.$objext
-	      eval test_cmds=\"$reload_cmds\"
-	      func_len " $test_cmds"
-	      len0=$func_len_result
-	      len=$len0
-
-	      # Loop over the list of objects to be linked.
-	      for obj in $save_libobjs
-	      do
-		func_len " $obj"
-		func_arith $len + $func_len_result
-		len=$func_arith_result
-		if test "X$objlist" = X ||
-		   test "$len" -lt "$max_cmd_len"; then
-		  func_append objlist " $obj"
-		else
-		  # The command $test_cmds is almost too long, add a
-		  # command to the queue.
-		  if test "$k" -eq 1 ; then
-		    # The first file doesn't have a previous command to add.
-		    reload_objs=$objlist
-		    eval concat_cmds=\"$reload_cmds\"
-		  else
-		    # All subsequent reloadable object files will link in
-		    # the last one created.
-		    reload_objs="$objlist $last_robj"
-		    eval concat_cmds=\"\$concat_cmds~$reload_cmds~\$RM $last_robj\"
-		  fi
-		  last_robj=$output_objdir/$output_la-${k}.$objext
-		  func_arith $k + 1
-		  k=$func_arith_result
-		  output=$output_objdir/$output_la-${k}.$objext
-		  objlist=" $obj"
-		  func_len " $last_robj"
-		  func_arith $len0 + $func_len_result
-		  len=$func_arith_result
-		fi
-	      done
-	      # Handle the remaining objects by creating one last
-	      # reloadable object file.  All subsequent reloadable object
-	      # files will link in the last one created.
-	      test -z "$concat_cmds" || concat_cmds=$concat_cmds~
-	      reload_objs="$objlist $last_robj"
-	      eval concat_cmds=\"\${concat_cmds}$reload_cmds\"
-	      if test -n "$last_robj"; then
-	        eval concat_cmds=\"\${concat_cmds}~\$RM $last_robj\"
-	      fi
-	      func_append delfiles " $output"
-
-	    else
-	      output=
-	    fi
-
-	    if ${skipped_export-false}; then
-	      func_verbose "generating symbol list for \`$libname.la'"
-	      export_symbols="$output_objdir/$libname.exp"
-	      $opt_dry_run || $RM $export_symbols
-	      libobjs=$output
-	      # Append the command to create the export file.
-	      test -z "$concat_cmds" || concat_cmds=$concat_cmds~
-	      eval concat_cmds=\"\$concat_cmds$export_symbols_cmds\"
-	      if test -n "$last_robj"; then
-		eval concat_cmds=\"\$concat_cmds~\$RM $last_robj\"
-	      fi
-	    fi
-
-	    test -n "$save_libobjs" &&
-	      func_verbose "creating a temporary reloadable object file: $output"
-
-	    # Loop through the commands generated above and execute them.
-	    save_ifs="$IFS"; IFS='~'
-	    for cmd in $concat_cmds; do
-	      IFS="$save_ifs"
-	      $opt_silent || {
-		  func_quote_for_expand "$cmd"
-		  eval "func_echo $func_quote_for_expand_result"
-	      }
-	      $opt_dry_run || eval "$cmd" || {
-		lt_exit=$?
-
-		# Restore the uninstalled library and exit
-		if test "$opt_mode" = relink; then
-		  ( cd "$output_objdir" && \
-		    $RM "${realname}T" && \
-		    $MV "${realname}U" "$realname" )
-		fi
-
-		exit $lt_exit
-	      }
-	    done
-	    IFS="$save_ifs"
-
-	    if test -n "$export_symbols_regex" && ${skipped_export-false}; then
-	      func_show_eval '$EGREP -e "$export_symbols_regex" "$export_symbols" > "${export_symbols}T"'
-	      func_show_eval '$MV "${export_symbols}T" "$export_symbols"'
-	    fi
-	  fi
-
-          if ${skipped_export-false}; then
-	    if test -n "$export_symbols" && test -n "$include_expsyms"; then
-	      tmp_export_symbols="$export_symbols"
-	      test -n "$orig_export_symbols" && tmp_export_symbols="$orig_export_symbols"
-	      $opt_dry_run || eval '$ECHO "$include_expsyms" | $SP2NL >> "$tmp_export_symbols"'
-	    fi
-
-	    if test -n "$orig_export_symbols"; then
-	      # The given exports_symbols file has to be filtered, so filter it.
-	      func_verbose "filter symbol list for \`$libname.la' to tag DATA exports"
-	      # FIXME: $output_objdir/$libname.filter potentially contains lots of
-	      # 's' commands which not all seds can handle. GNU sed should be fine
-	      # though. Also, the filter scales superlinearly with the number of
-	      # global variables. join(1) would be nice here, but unfortunately
-	      # isn't a blessed tool.
-	      $opt_dry_run || $SED -e '/[ ,]DATA/!d;s,\(.*\)\([ \,].*\),s|^\1$|\1\2|,' < $export_symbols > $output_objdir/$libname.filter
-	      func_append delfiles " $export_symbols $output_objdir/$libname.filter"
-	      export_symbols=$output_objdir/$libname.def
-	      $opt_dry_run || $SED -f $output_objdir/$libname.filter < $orig_export_symbols > $export_symbols
-	    fi
-	  fi
-
-	  libobjs=$output
-	  # Restore the value of output.
-	  output=$save_output
-
-	  if test -n "$convenience" && test -n "$whole_archive_flag_spec"; then
-	    eval libobjs=\"\$libobjs $whole_archive_flag_spec\"
-	    test "X$libobjs" = "X " && libobjs=
-	  fi
-	  # Expand the library linking commands again to reset the
-	  # value of $libobjs for piecewise linking.
-
-	  # Do each of the archive commands.
-	  if test "$module" = yes && test -n "$module_cmds" ; then
-	    if test -n "$export_symbols" && test -n "$module_expsym_cmds"; then
-	      cmds=$module_expsym_cmds
-	    else
-	      cmds=$module_cmds
-	    fi
-	  else
-	    if test -n "$export_symbols" && test -n "$archive_expsym_cmds"; then
-	      cmds=$archive_expsym_cmds
-	    else
-	      cmds=$archive_cmds
-	    fi
-	  fi
-	fi
-
-	if test -n "$delfiles"; then
-	  # Append the command to remove temporary files to $cmds.
-	  eval cmds=\"\$cmds~\$RM $delfiles\"
-	fi
-
-	# Add any objects from preloaded convenience libraries
-	if test -n "$dlprefiles"; then
-	  gentop="$output_objdir/${outputname}x"
-	  func_append generated " $gentop"
-
-	  func_extract_archives $gentop $dlprefiles
-	  func_append libobjs " $func_extract_archives_result"
-	  test "X$libobjs" = "X " && libobjs=
-	fi
-
-	save_ifs="$IFS"; IFS='~'
-	for cmd in $cmds; do
-	  IFS="$save_ifs"
-	  eval cmd=\"$cmd\"
-	  $opt_silent || {
-	    func_quote_for_expand "$cmd"
-	    eval "func_echo $func_quote_for_expand_result"
-	  }
-	  $opt_dry_run || eval "$cmd" || {
-	    lt_exit=$?
-
-	    # Restore the uninstalled library and exit
-	    if test "$opt_mode" = relink; then
-	      ( cd "$output_objdir" && \
-	        $RM "${realname}T" && \
-		$MV "${realname}U" "$realname" )
-	    fi
-
-	    exit $lt_exit
-	  }
-	done
-	IFS="$save_ifs"
-
-	# Restore the uninstalled library and exit
-	if test "$opt_mode" = relink; then
-	  $opt_dry_run || eval '(cd $output_objdir && $RM ${realname}T && $MV $realname ${realname}T && $MV ${realname}U $realname)' || exit $?
-
-	  if test -n "$convenience"; then
-	    if test -z "$whole_archive_flag_spec"; then
-	      func_show_eval '${RM}r "$gentop"'
-	    fi
-	  fi
-
-	  exit $EXIT_SUCCESS
-	fi
-
-	# Create links to the real library.
-	for linkname in $linknames; do
-	  if test "$realname" != "$linkname"; then
-	    func_show_eval '(cd "$output_objdir" && $RM "$linkname" && $LN_S "$realname" "$linkname")' 'exit $?'
-	  fi
-	done
-
-	# If -module or -export-dynamic was specified, set the dlname.
-	if test "$module" = yes || test "$export_dynamic" = yes; then
-	  # On all known operating systems, these are identical.
-	  dlname="$soname"
-	fi
-      fi
-      ;;
-
-    obj)
-      if test -n "$dlfiles$dlprefiles" || test "$dlself" != no; then
-	func_warning "\`-dlopen' is ignored for objects"
-      fi
-
-      case " $deplibs" in
-      *\ -l* | *\ -L*)
-	func_warning "\`-l' and \`-L' are ignored for objects" ;;
-      esac
-
-      test -n "$rpath" && \
-	func_warning "\`-rpath' is ignored for objects"
-
-      test -n "$xrpath" && \
-	func_warning "\`-R' is ignored for objects"
-
-      test -n "$vinfo" && \
-	func_warning "\`-version-info' is ignored for objects"
-
-      test -n "$release" && \
-	func_warning "\`-release' is ignored for objects"
-
-      case $output in
-      *.lo)
-	test -n "$objs$old_deplibs" && \
-	  func_fatal_error "cannot build library object \`$output' from non-libtool objects"
-
-	libobj=$output
-	func_lo2o "$libobj"
-	obj=$func_lo2o_result
-	;;
-      *)
-	libobj=
-	obj="$output"
-	;;
-      esac
-
-      # Delete the old objects.
-      $opt_dry_run || $RM $obj $libobj
-
-      # Objects from convenience libraries.  This assumes
-      # single-version convenience libraries.  Whenever we create
-      # different ones for PIC/non-PIC, this we'll have to duplicate
-      # the extraction.
-      reload_conv_objs=
-      gentop=
-      # reload_cmds runs $LD directly, so let us get rid of
-      # -Wl from whole_archive_flag_spec and hope we can get by with
-      # turning comma into space..
-      wl=
-
-      if test -n "$convenience"; then
-	if test -n "$whole_archive_flag_spec"; then
-	  eval tmp_whole_archive_flags=\"$whole_archive_flag_spec\"
-	  reload_conv_objs=$reload_objs\ `$ECHO "$tmp_whole_archive_flags" | $SED 's|,| |g'`
-	else
-	  gentop="$output_objdir/${obj}x"
-	  func_append generated " $gentop"
-
-	  func_extract_archives $gentop $convenience
-	  reload_conv_objs="$reload_objs $func_extract_archives_result"
-	fi
-      fi
-
-      # If we're not building shared, we need to use non_pic_objs
-      test "$build_libtool_libs" != yes && libobjs="$non_pic_objects"
-
-      # Create the old-style object.
-      reload_objs="$objs$old_deplibs "`$ECHO "$libobjs" | $SP2NL | $SED "/\.${libext}$/d; /\.lib$/d; $lo2o" | $NL2SP`" $reload_conv_objs" ### testsuite: skip nested quoting test
-
-      output="$obj"
-      func_execute_cmds "$reload_cmds" 'exit $?'
-
-      # Exit if we aren't doing a library object file.
-      if test -z "$libobj"; then
-	if test -n "$gentop"; then
-	  func_show_eval '${RM}r "$gentop"'
-	fi
-
-	exit $EXIT_SUCCESS
-      fi
-
-      if test "$build_libtool_libs" != yes; then
-	if test -n "$gentop"; then
-	  func_show_eval '${RM}r "$gentop"'
-	fi
-
-	# Create an invalid libtool object if no PIC, so that we don't
-	# accidentally link it into a program.
-	# $show "echo timestamp > $libobj"
-	# $opt_dry_run || eval "echo timestamp > $libobj" || exit $?
-	exit $EXIT_SUCCESS
-      fi
-
-      if test -n "$pic_flag" || test "$pic_mode" != default; then
-	# Only do commands if we really have different PIC objects.
-	reload_objs="$libobjs $reload_conv_objs"
-	output="$libobj"
-	func_execute_cmds "$reload_cmds" 'exit $?'
-      fi
-
-      if test -n "$gentop"; then
-	func_show_eval '${RM}r "$gentop"'
-      fi
-
-      exit $EXIT_SUCCESS
-      ;;
-
-    prog)
-      case $host in
-	*cygwin*) func_stripname '' '.exe' "$output"
-	          output=$func_stripname_result.exe;;
-      esac
-      test -n "$vinfo" && \
-	func_warning "\`-version-info' is ignored for programs"
-
-      test -n "$release" && \
-	func_warning "\`-release' is ignored for programs"
-
-      test "$preload" = yes \
-        && test "$dlopen_support" = unknown \
-	&& test "$dlopen_self" = unknown \
-	&& test "$dlopen_self_static" = unknown && \
-	  func_warning "\`LT_INIT([dlopen])' not used. Assuming no dlopen support."
-
-      case $host in
-      *-*-rhapsody* | *-*-darwin1.[012])
-	# On Rhapsody replace the C library is the System framework
-	compile_deplibs=`$ECHO " $compile_deplibs" | $SED 's/ -lc / System.ltframework /'`
-	finalize_deplibs=`$ECHO " $finalize_deplibs" | $SED 's/ -lc / System.ltframework /'`
-	;;
-      esac
-
-      case $host in
-      *-*-darwin*)
-	# Don't allow lazy linking, it breaks C++ global constructors
-	# But is supposedly fixed on 10.4 or later (yay!).
-	if test "$tagname" = CXX ; then
-	  case ${MACOSX_DEPLOYMENT_TARGET-10.0} in
-	    10.[0123])
-	      func_append compile_command " ${wl}-bind_at_load"
-	      func_append finalize_command " ${wl}-bind_at_load"
-	    ;;
-	  esac
-	fi
-	# Time to change all our "foo.ltframework" stuff back to "-framework foo"
-	compile_deplibs=`$ECHO " $compile_deplibs" | $SED 's% \([^ $]*\).ltframework% -framework \1%g'`
-	finalize_deplibs=`$ECHO " $finalize_deplibs" | $SED 's% \([^ $]*\).ltframework% -framework \1%g'`
-	;;
-      esac
-
-
-      # move library search paths that coincide with paths to not yet
-      # installed libraries to the beginning of the library search list
-      new_libs=
-      for path in $notinst_path; do
-	case " $new_libs " in
-	*" -L$path/$objdir "*) ;;
-	*)
-	  case " $compile_deplibs " in
-	  *" -L$path/$objdir "*)
-	    func_append new_libs " -L$path/$objdir" ;;
-	  esac
-	  ;;
-	esac
-      done
-      for deplib in $compile_deplibs; do
-	case $deplib in
-	-L*)
-	  case " $new_libs " in
-	  *" $deplib "*) ;;
-	  *) func_append new_libs " $deplib" ;;
-	  esac
-	  ;;
-	*) func_append new_libs " $deplib" ;;
-	esac
-      done
-      compile_deplibs="$new_libs"
-
-
-      func_append compile_command " $compile_deplibs"
-      func_append finalize_command " $finalize_deplibs"
-
-      if test -n "$rpath$xrpath"; then
-	# If the user specified any rpath flags, then add them.
-	for libdir in $rpath $xrpath; do
-	  # This is the magic to use -rpath.
-	  case "$finalize_rpath " in
-	  *" $libdir "*) ;;
-	  *) func_append finalize_rpath " $libdir" ;;
-	  esac
-	done
-      fi
-
-      # Now hardcode the library paths
-      rpath=
-      hardcode_libdirs=
-      for libdir in $compile_rpath $finalize_rpath; do
-	if test -n "$hardcode_libdir_flag_spec"; then
-	  if test -n "$hardcode_libdir_separator"; then
-	    if test -z "$hardcode_libdirs"; then
-	      hardcode_libdirs="$libdir"
-	    else
-	      # Just accumulate the unique libdirs.
-	      case $hardcode_libdir_separator$hardcode_libdirs$hardcode_libdir_separator in
-	      *"$hardcode_libdir_separator$libdir$hardcode_libdir_separator"*)
-		;;
-	      *)
-		func_append hardcode_libdirs "$hardcode_libdir_separator$libdir"
-		;;
-	      esac
-	    fi
-	  else
-	    eval flag=\"$hardcode_libdir_flag_spec\"
-	    func_append rpath " $flag"
-	  fi
-	elif test -n "$runpath_var"; then
-	  case "$perm_rpath " in
-	  *" $libdir "*) ;;
-	  *) func_append perm_rpath " $libdir" ;;
-	  esac
-	fi
-	case $host in
-	*-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-os2* | *-cegcc*)
-	  testbindir=`${ECHO} "$libdir" | ${SED} -e 's*/lib$*/bin*'`
-	  case :$dllsearchpath: in
-	  *":$libdir:"*) ;;
-	  ::) dllsearchpath=$libdir;;
-	  *) func_append dllsearchpath ":$libdir";;
-	  esac
-	  case :$dllsearchpath: in
-	  *":$testbindir:"*) ;;
-	  ::) dllsearchpath=$testbindir;;
-	  *) func_append dllsearchpath ":$testbindir";;
-	  esac
-	  ;;
-	esac
-      done
-      # Substitute the hardcoded libdirs into the rpath.
-      if test -n "$hardcode_libdir_separator" &&
-	 test -n "$hardcode_libdirs"; then
-	libdir="$hardcode_libdirs"
-	eval rpath=\" $hardcode_libdir_flag_spec\"
-      fi
-      compile_rpath="$rpath"
-
-      rpath=
-      hardcode_libdirs=
-      for libdir in $finalize_rpath; do
-	if test -n "$hardcode_libdir_flag_spec"; then
-	  if test -n "$hardcode_libdir_separator"; then
-	    if test -z "$hardcode_libdirs"; then
-	      hardcode_libdirs="$libdir"
-	    else
-	      # Just accumulate the unique libdirs.
-	      case $hardcode_libdir_separator$hardcode_libdirs$hardcode_libdir_separator in
-	      *"$hardcode_libdir_separator$libdir$hardcode_libdir_separator"*)
-		;;
-	      *)
-		func_append hardcode_libdirs "$hardcode_libdir_separator$libdir"
-		;;
-	      esac
-	    fi
-	  else
-	    eval flag=\"$hardcode_libdir_flag_spec\"
-	    func_append rpath " $flag"
-	  fi
-	elif test -n "$runpath_var"; then
-	  case "$finalize_perm_rpath " in
-	  *" $libdir "*) ;;
-	  *) func_append finalize_perm_rpath " $libdir" ;;
-	  esac
-	fi
-      done
-      # Substitute the hardcoded libdirs into the rpath.
-      if test -n "$hardcode_libdir_separator" &&
-	 test -n "$hardcode_libdirs"; then
-	libdir="$hardcode_libdirs"
-	eval rpath=\" $hardcode_libdir_flag_spec\"
-      fi
-      finalize_rpath="$rpath"
-
-      if test -n "$libobjs" && test "$build_old_libs" = yes; then
-	# Transform all the library objects into standard objects.
-	compile_command=`$ECHO "$compile_command" | $SP2NL | $SED "$lo2o" | $NL2SP`
-	finalize_command=`$ECHO "$finalize_command" | $SP2NL | $SED "$lo2o" | $NL2SP`
-      fi
-
-      func_generate_dlsyms "$outputname" "@PROGRAM@" "no"
-
-      # template prelinking step
-      if test -n "$prelink_cmds"; then
-	func_execute_cmds "$prelink_cmds" 'exit $?'
-      fi
-
-      wrappers_required=yes
-      case $host in
-      *cegcc* | *mingw32ce*)
-        # Disable wrappers for cegcc and mingw32ce hosts, we are cross compiling anyway.
-        wrappers_required=no
-        ;;
-      *cygwin* | *mingw* )
-        if test "$build_libtool_libs" != yes; then
-          wrappers_required=no
-        fi
-        ;;
-      *)
-        if test "$need_relink" = no || test "$build_libtool_libs" != yes; then
-          wrappers_required=no
-        fi
-        ;;
-      esac
-      if test "$wrappers_required" = no; then
-	# Replace the output file specification.
-	compile_command=`$ECHO "$compile_command" | $SED 's%@OUTPUT@%'"$output"'%g'`
-	link_command="$compile_command$compile_rpath"
-
-	# We have no uninstalled library dependencies, so finalize right now.
-	exit_status=0
-	func_show_eval "$link_command" 'exit_status=$?'
-
-	if test -n "$postlink_cmds"; then
-	  func_to_tool_file "$output"
-	  postlink_cmds=`func_echo_all "$postlink_cmds" | $SED -e 's%@OUTPUT@%'"$output"'%g' -e 's%@TOOL_OUTPUT@%'"$func_to_tool_file_result"'%g'`
-	  func_execute_cmds "$postlink_cmds" 'exit $?'
-	fi
-
-	# Delete the generated files.
-	if test -f "$output_objdir/${outputname}S.${objext}"; then
-	  func_show_eval '$RM "$output_objdir/${outputname}S.${objext}"'
-	fi
-
-	exit $exit_status
-      fi
-
-      if test -n "$compile_shlibpath$finalize_shlibpath"; then
-	compile_command="$shlibpath_var=\"$compile_shlibpath$finalize_shlibpath\$$shlibpath_var\" $compile_command"
-      fi
-      if test -n "$finalize_shlibpath"; then
-	finalize_command="$shlibpath_var=\"$finalize_shlibpath\$$shlibpath_var\" $finalize_command"
-      fi
-
-      compile_var=
-      finalize_var=
-      if test -n "$runpath_var"; then
-	if test -n "$perm_rpath"; then
-	  # We should set the runpath_var.
-	  rpath=
-	  for dir in $perm_rpath; do
-	    func_append rpath "$dir:"
-	  done
-	  compile_var="$runpath_var=\"$rpath\$$runpath_var\" "
-	fi
-	if test -n "$finalize_perm_rpath"; then
-	  # We should set the runpath_var.
-	  rpath=
-	  for dir in $finalize_perm_rpath; do
-	    func_append rpath "$dir:"
-	  done
-	  finalize_var="$runpath_var=\"$rpath\$$runpath_var\" "
-	fi
-      fi
-
-      if test "$no_install" = yes; then
-	# We don't need to create a wrapper script.
-	link_command="$compile_var$compile_command$compile_rpath"
-	# Replace the output file specification.
-	link_command=`$ECHO "$link_command" | $SED 's%@OUTPUT@%'"$output"'%g'`
-	# Delete the old output file.
-	$opt_dry_run || $RM $output
-	# Link the executable and exit
-	func_show_eval "$link_command" 'exit $?'
-
-	if test -n "$postlink_cmds"; then
-	  func_to_tool_file "$output"
-	  postlink_cmds=`func_echo_all "$postlink_cmds" | $SED -e 's%@OUTPUT@%'"$output"'%g' -e 's%@TOOL_OUTPUT@%'"$func_to_tool_file_result"'%g'`
-	  func_execute_cmds "$postlink_cmds" 'exit $?'
-	fi
-
-	exit $EXIT_SUCCESS
-      fi
-
-      if test "$hardcode_action" = relink; then
-	# Fast installation is not supported
-	link_command="$compile_var$compile_command$compile_rpath"
-	relink_command="$finalize_var$finalize_command$finalize_rpath"
-
-	func_warning "this platform does not like uninstalled shared libraries"
-	func_warning "\`$output' will be relinked during installation"
-      else
-	if test "$fast_install" != no; then
-	  link_command="$finalize_var$compile_command$finalize_rpath"
-	  if test "$fast_install" = yes; then
-	    relink_command=`$ECHO "$compile_var$compile_command$compile_rpath" | $SED 's%@OUTPUT@%\$progdir/\$file%g'`
-	  else
-	    # fast_install is set to needless
-	    relink_command=
-	  fi
-	else
-	  link_command="$compile_var$compile_command$compile_rpath"
-	  relink_command="$finalize_var$finalize_command$finalize_rpath"
-	fi
-      fi
-
-      # Replace the output file specification.
-      link_command=`$ECHO "$link_command" | $SED 's%@OUTPUT@%'"$output_objdir/$outputname"'%g'`
-
-      # Delete the old output files.
-      $opt_dry_run || $RM $output $output_objdir/$outputname $output_objdir/lt-$outputname
-
-      func_show_eval "$link_command" 'exit $?'
-
-      if test -n "$postlink_cmds"; then
-	func_to_tool_file "$output_objdir/$outputname"
-	postlink_cmds=`func_echo_all "$postlink_cmds" | $SED -e 's%@OUTPUT@%'"$output_objdir/$outputname"'%g' -e 's%@TOOL_OUTPUT@%'"$func_to_tool_file_result"'%g'`
-	func_execute_cmds "$postlink_cmds" 'exit $?'
-      fi
-
-      # Now create the wrapper script.
-      func_verbose "creating $output"
-
-      # Quote the relink command for shipping.
-      if test -n "$relink_command"; then
-	# Preserve any variables that may affect compiler behavior
-	for var in $variables_saved_for_relink; do
-	  if eval test -z \"\${$var+set}\"; then
-	    relink_command="{ test -z \"\${$var+set}\" || $lt_unset $var || { $var=; export $var; }; }; $relink_command"
-	  elif eval var_value=\$$var; test -z "$var_value"; then
-	    relink_command="$var=; export $var; $relink_command"
-	  else
-	    func_quote_for_eval "$var_value"
-	    relink_command="$var=$func_quote_for_eval_result; export $var; $relink_command"
-	  fi
-	done
-	relink_command="(cd `pwd`; $relink_command)"
-	relink_command=`$ECHO "$relink_command" | $SED "$sed_quote_subst"`
-      fi
-
-      # Only actually do things if not in dry run mode.
-      $opt_dry_run || {
-	# win32 will think the script is a binary if it has
-	# a .exe suffix, so we strip it off here.
-	case $output in
-	  *.exe) func_stripname '' '.exe' "$output"
-	         output=$func_stripname_result ;;
-	esac
-	# test for cygwin because mv fails w/o .exe extensions
-	case $host in
-	  *cygwin*)
-	    exeext=.exe
-	    func_stripname '' '.exe' "$outputname"
-	    outputname=$func_stripname_result ;;
-	  *) exeext= ;;
-	esac
-	case $host in
-	  *cygwin* | *mingw* )
-	    func_dirname_and_basename "$output" "" "."
-	    output_name=$func_basename_result
-	    output_path=$func_dirname_result
-	    cwrappersource="$output_path/$objdir/lt-$output_name.c"
-	    cwrapper="$output_path/$output_name.exe"
-	    $RM $cwrappersource $cwrapper
-	    trap "$RM $cwrappersource $cwrapper; exit $EXIT_FAILURE" 1 2 15
-
-	    func_emit_cwrapperexe_src > $cwrappersource
-
-	    # The wrapper executable is built using the $host compiler,
-	    # because it contains $host paths and files. If cross-
-	    # compiling, it, like the target executable, must be
-	    # executed on the $host or under an emulation environment.
-	    $opt_dry_run || {
-	      $LTCC $LTCFLAGS -o $cwrapper $cwrappersource
-	      $STRIP $cwrapper
-	    }
-
-	    # Now, create the wrapper script for func_source use:
-	    func_ltwrapper_scriptname $cwrapper
-	    $RM $func_ltwrapper_scriptname_result
-	    trap "$RM $func_ltwrapper_scriptname_result; exit $EXIT_FAILURE" 1 2 15
-	    $opt_dry_run || {
-	      # note: this script will not be executed, so do not chmod.
-	      if test "x$build" = "x$host" ; then
-		$cwrapper --lt-dump-script > $func_ltwrapper_scriptname_result
-	      else
-		func_emit_wrapper no > $func_ltwrapper_scriptname_result
-	      fi
-	    }
-	  ;;
-	  * )
-	    $RM $output
-	    trap "$RM $output; exit $EXIT_FAILURE" 1 2 15
-
-	    func_emit_wrapper no > $output
-	    chmod +x $output
-	  ;;
-	esac
-      }
-      exit $EXIT_SUCCESS
-      ;;
-    esac
-
-    # See if we need to build an old-fashioned archive.
-    for oldlib in $oldlibs; do
-
-      if test "$build_libtool_libs" = convenience; then
-	oldobjs="$libobjs_save $symfileobj"
-	addlibs="$convenience"
-	build_libtool_libs=no
-      else
-	if test "$build_libtool_libs" = module; then
-	  oldobjs="$libobjs_save"
-	  build_libtool_libs=no
-	else
-	  oldobjs="$old_deplibs $non_pic_objects"
-	  if test "$preload" = yes && test -f "$symfileobj"; then
-	    func_append oldobjs " $symfileobj"
-	  fi
-	fi
-	addlibs="$old_convenience"
-      fi
-
-      if test -n "$addlibs"; then
-	gentop="$output_objdir/${outputname}x"
-	func_append generated " $gentop"
-
-	func_extract_archives $gentop $addlibs
-	func_append oldobjs " $func_extract_archives_result"
-      fi
-
-      # Do each command in the archive commands.
-      if test -n "$old_archive_from_new_cmds" && test "$build_libtool_libs" = yes; then
-	cmds=$old_archive_from_new_cmds
-      else
-
-	# Add any objects from preloaded convenience libraries
-	if test -n "$dlprefiles"; then
-	  gentop="$output_objdir/${outputname}x"
-	  func_append generated " $gentop"
-
-	  func_extract_archives $gentop $dlprefiles
-	  func_append oldobjs " $func_extract_archives_result"
-	fi
-
-	# POSIX demands no paths to be encoded in archives.  We have
-	# to avoid creating archives with duplicate basenames if we
-	# might have to extract them afterwards, e.g., when creating a
-	# static archive out of a convenience library, or when linking
-	# the entirety of a libtool archive into another (currently
-	# not supported by libtool).
-	if (for obj in $oldobjs
-	    do
-	      func_basename "$obj"
-	      $ECHO "$func_basename_result"
-	    done | sort | sort -uc >/dev/null 2>&1); then
-	  :
-	else
-	  echo "copying selected object files to avoid basename conflicts..."
-	  gentop="$output_objdir/${outputname}x"
-	  func_append generated " $gentop"
-	  func_mkdir_p "$gentop"
-	  save_oldobjs=$oldobjs
-	  oldobjs=
-	  counter=1
-	  for obj in $save_oldobjs
-	  do
-	    func_basename "$obj"
-	    objbase="$func_basename_result"
-	    case " $oldobjs " in
-	    " ") oldobjs=$obj ;;
-	    *[\ /]"$objbase "*)
-	      while :; do
-		# Make sure we don't pick an alternate name that also
-		# overlaps.
-		newobj=lt$counter-$objbase
-		func_arith $counter + 1
-		counter=$func_arith_result
-		case " $oldobjs " in
-		*[\ /]"$newobj "*) ;;
-		*) if test ! -f "$gentop/$newobj"; then break; fi ;;
-		esac
-	      done
-	      func_show_eval "ln $obj $gentop/$newobj || cp $obj $gentop/$newobj"
-	      func_append oldobjs " $gentop/$newobj"
-	      ;;
-	    *) func_append oldobjs " $obj" ;;
-	    esac
-	  done
-	fi
-	func_to_tool_file "$oldlib" func_convert_file_msys_to_w32
-	tool_oldlib=$func_to_tool_file_result
-	eval cmds=\"$old_archive_cmds\"
-
-	func_len " $cmds"
-	len=$func_len_result
-	if test "$len" -lt "$max_cmd_len" || test "$max_cmd_len" -le -1; then
-	  cmds=$old_archive_cmds
-	elif test -n "$archiver_list_spec"; then
-	  func_verbose "using command file archive linking..."
-	  for obj in $oldobjs
-	  do
-	    func_to_tool_file "$obj"
-	    $ECHO "$func_to_tool_file_result"
-	  done > $output_objdir/$libname.libcmd
-	  func_to_tool_file "$output_objdir/$libname.libcmd"
-	  oldobjs=" $archiver_list_spec$func_to_tool_file_result"
-	  cmds=$old_archive_cmds
-	else
-	  # the command line is too long to link in one step, link in parts
-	  func_verbose "using piecewise archive linking..."
-	  save_RANLIB=$RANLIB
-	  RANLIB=:
-	  objlist=
-	  concat_cmds=
-	  save_oldobjs=$oldobjs
-	  oldobjs=
-	  # Is there a better way of finding the last object in the list?
-	  for obj in $save_oldobjs
-	  do
-	    last_oldobj=$obj
-	  done
-	  eval test_cmds=\"$old_archive_cmds\"
-	  func_len " $test_cmds"
-	  len0=$func_len_result
-	  len=$len0
-	  for obj in $save_oldobjs
-	  do
-	    func_len " $obj"
-	    func_arith $len + $func_len_result
-	    len=$func_arith_result
-	    func_append objlist " $obj"
-	    if test "$len" -lt "$max_cmd_len"; then
-	      :
-	    else
-	      # the above command should be used before it gets too long
-	      oldobjs=$objlist
-	      if test "$obj" = "$last_oldobj" ; then
-		RANLIB=$save_RANLIB
-	      fi
-	      test -z "$concat_cmds" || concat_cmds=$concat_cmds~
-	      eval concat_cmds=\"\${concat_cmds}$old_archive_cmds\"
-	      objlist=
-	      len=$len0
-	    fi
-	  done
-	  RANLIB=$save_RANLIB
-	  oldobjs=$objlist
-	  if test "X$oldobjs" = "X" ; then
-	    eval cmds=\"\$concat_cmds\"
-	  else
-	    eval cmds=\"\$concat_cmds~\$old_archive_cmds\"
-	  fi
-	fi
-      fi
-      func_execute_cmds "$cmds" 'exit $?'
-    done
-
-    test -n "$generated" && \
-      func_show_eval "${RM}r$generated"
-
-    # Now create the libtool archive.
-    case $output in
-    *.la)
-      old_library=
-      test "$build_old_libs" = yes && old_library="$libname.$libext"
-      func_verbose "creating $output"
-
-      # Preserve any variables that may affect compiler behavior
-      for var in $variables_saved_for_relink; do
-	if eval test -z \"\${$var+set}\"; then
-	  relink_command="{ test -z \"\${$var+set}\" || $lt_unset $var || { $var=; export $var; }; }; $relink_command"
-	elif eval var_value=\$$var; test -z "$var_value"; then
-	  relink_command="$var=; export $var; $relink_command"
-	else
-	  func_quote_for_eval "$var_value"
-	  relink_command="$var=$func_quote_for_eval_result; export $var; $relink_command"
-	fi
-      done
-      # Quote the link command for shipping.
-      relink_command="(cd `pwd`; $SHELL $progpath $preserve_args --mode=relink $libtool_args @inst_prefix_dir@)"
-      relink_command=`$ECHO "$relink_command" | $SED "$sed_quote_subst"`
-      if test "$hardcode_automatic" = yes ; then
-	relink_command=
-      fi
-
-      # Only create the output if not a dry run.
-      $opt_dry_run || {
-	for installed in no yes; do
-	  if test "$installed" = yes; then
-	    if test -z "$install_libdir"; then
-	      break
-	    fi
-	    output="$output_objdir/$outputname"i
-	    # Replace all uninstalled libtool libraries with the installed ones
-	    newdependency_libs=
-	    for deplib in $dependency_libs; do
-	      case $deplib in
-	      *.la)
-		func_basename "$deplib"
-		name="$func_basename_result"
-		func_resolve_sysroot "$deplib"
-		eval libdir=`${SED} -n -e 's/^libdir=\(.*\)$/\1/p' $func_resolve_sysroot_result`
-		test -z "$libdir" && \
-		  func_fatal_error "\`$deplib' is not a valid libtool archive"
-		func_append newdependency_libs " ${lt_sysroot:+=}$libdir/$name"
-		;;
-	      -L*)
-		func_stripname -L '' "$deplib"
-		func_replace_sysroot "$func_stripname_result"
-		func_append newdependency_libs " -L$func_replace_sysroot_result"
-		;;
-	      -R*)
-		func_stripname -R '' "$deplib"
-		func_replace_sysroot "$func_stripname_result"
-		func_append newdependency_libs " -R$func_replace_sysroot_result"
-		;;
-	      *) func_append newdependency_libs " $deplib" ;;
-	      esac
-	    done
-	    dependency_libs="$newdependency_libs"
-	    newdlfiles=
-
-	    for lib in $dlfiles; do
-	      case $lib in
-	      *.la)
-	        func_basename "$lib"
-		name="$func_basename_result"
-		eval libdir=`${SED} -n -e 's/^libdir=\(.*\)$/\1/p' $lib`
-		test -z "$libdir" && \
-		  func_fatal_error "\`$lib' is not a valid libtool archive"
-		func_append newdlfiles " ${lt_sysroot:+=}$libdir/$name"
-		;;
-	      *) func_append newdlfiles " $lib" ;;
-	      esac
-	    done
-	    dlfiles="$newdlfiles"
-	    newdlprefiles=
-	    for lib in $dlprefiles; do
-	      case $lib in
-	      *.la)
-		# Only pass preopened files to the pseudo-archive (for
-		# eventual linking with the app. that links it) if we
-		# didn't already link the preopened objects directly into
-		# the library:
-		func_basename "$lib"
-		name="$func_basename_result"
-		eval libdir=`${SED} -n -e 's/^libdir=\(.*\)$/\1/p' $lib`
-		test -z "$libdir" && \
-		  func_fatal_error "\`$lib' is not a valid libtool archive"
-		func_append newdlprefiles " ${lt_sysroot:+=}$libdir/$name"
-		;;
-	      esac
-	    done
-	    dlprefiles="$newdlprefiles"
-	  else
-	    newdlfiles=
-	    for lib in $dlfiles; do
-	      case $lib in
-		[\\/]* | [A-Za-z]:[\\/]*) abs="$lib" ;;
-		*) abs=`pwd`"/$lib" ;;
-	      esac
-	      func_append newdlfiles " $abs"
-	    done
-	    dlfiles="$newdlfiles"
-	    newdlprefiles=
-	    for lib in $dlprefiles; do
-	      case $lib in
-		[\\/]* | [A-Za-z]:[\\/]*) abs="$lib" ;;
-		*) abs=`pwd`"/$lib" ;;
-	      esac
-	      func_append newdlprefiles " $abs"
-	    done
-	    dlprefiles="$newdlprefiles"
-	  fi
-	  $RM $output
-	  # place dlname in correct position for cygwin
-	  # In fact, it would be nice if we could use this code for all target
-	  # systems that can't hard-code library paths into their executables
-	  # and that have no shared library path variable independent of PATH,
-	  # but it turns out we can't easily determine that from inspecting
-	  # libtool variables, so we have to hard-code the OSs to which it
-	  # applies here; at the moment, that means platforms that use the PE
-	  # object format with DLL files.  See the long comment at the top of
-	  # tests/bindir.at for full details.
-	  tdlname=$dlname
-	  case $host,$output,$installed,$module,$dlname in
-	    *cygwin*,*lai,yes,no,*.dll | *mingw*,*lai,yes,no,*.dll | *cegcc*,*lai,yes,no,*.dll)
-	      # If a -bindir argument was supplied, place the dll there.
-	      if test "x$bindir" != x ;
-	      then
-		func_relative_path "$install_libdir" "$bindir"
-		tdlname=$func_relative_path_result$dlname
-	      else
-		# Otherwise fall back on heuristic.
-		tdlname=../bin/$dlname
-	      fi
-	      ;;
-	  esac
-	  $ECHO > $output "\
-# $outputname - a libtool library file
-# Generated by $PROGRAM (GNU $PACKAGE$TIMESTAMP) $VERSION
-#
-# Please DO NOT delete this file!
-# It is necessary for linking the library.
-
-# The name that we can dlopen(3).
-dlname='$tdlname'
-
-# Names of this library.
-library_names='$library_names'
-
-# The name of the static archive.
-old_library='$old_library'
-
-# Linker flags that can not go in dependency_libs.
-inherited_linker_flags='$new_inherited_linker_flags'
-
-# Libraries that this one depends upon.
-dependency_libs='$dependency_libs'
-
-# Names of additional weak libraries provided by this library
-weak_library_names='$weak_libs'
-
-# Version information for $libname.
-current=$current
-age=$age
-revision=$revision
-
-# Is this an already installed library?
-installed=$installed
-
-# Should we warn about portability when linking against -modules?
-shouldnotlink=$module
-
-# Files to dlopen/dlpreopen
-dlopen='$dlfiles'
-dlpreopen='$dlprefiles'
-
-# Directory that this library needs to be installed in:
-libdir='$install_libdir'"
-	  if test "$installed" = no && test "$need_relink" = yes; then
-	    $ECHO >> $output "\
-relink_command=\"$relink_command\""
-	  fi
-	done
-      }
-
-      # Do a symbolic link so that the libtool archive can be found in
-      # LD_LIBRARY_PATH before the program is installed.
-      func_show_eval '( cd "$output_objdir" && $RM "$outputname" && $LN_S "../$outputname" "$outputname" )' 'exit $?'
-      ;;
-    esac
-    exit $EXIT_SUCCESS
-}
-
-{ test "$opt_mode" = link || test "$opt_mode" = relink; } &&
-    func_mode_link ${1+"$@"}
-
-
-# func_mode_uninstall arg...
-func_mode_uninstall ()
-{
-    $opt_debug
-    RM="$nonopt"
-    files=
-    rmforce=
-    exit_status=0
-
-    # This variable tells wrapper scripts just to set variables rather
-    # than running their programs.
-    libtool_install_magic="$magic"
-
-    for arg
-    do
-      case $arg in
-      -f) func_append RM " $arg"; rmforce=yes ;;
-      -*) func_append RM " $arg" ;;
-      *) func_append files " $arg" ;;
-      esac
-    done
-
-    test -z "$RM" && \
-      func_fatal_help "you must specify an RM program"
-
-    rmdirs=
-
-    for file in $files; do
-      func_dirname "$file" "" "."
-      dir="$func_dirname_result"
-      if test "X$dir" = X.; then
-	odir="$objdir"
-      else
-	odir="$dir/$objdir"
-      fi
-      func_basename "$file"
-      name="$func_basename_result"
-      test "$opt_mode" = uninstall && odir="$dir"
-
-      # Remember odir for removal later, being careful to avoid duplicates
-      if test "$opt_mode" = clean; then
-	case " $rmdirs " in
-	  *" $odir "*) ;;
-	  *) func_append rmdirs " $odir" ;;
-	esac
-      fi
-
-      # Don't error if the file doesn't exist and rm -f was used.
-      if { test -L "$file"; } >/dev/null 2>&1 ||
-	 { test -h "$file"; } >/dev/null 2>&1 ||
-	 test -f "$file"; then
-	:
-      elif test -d "$file"; then
-	exit_status=1
-	continue
-      elif test "$rmforce" = yes; then
-	continue
-      fi
-
-      rmfiles="$file"
-
-      case $name in
-      *.la)
-	# Possibly a libtool archive, so verify it.
-	if func_lalib_p "$file"; then
-	  func_source $dir/$name
-
-	  # Delete the libtool libraries and symlinks.
-	  for n in $library_names; do
-	    func_append rmfiles " $odir/$n"
-	  done
-	  test -n "$old_library" && func_append rmfiles " $odir/$old_library"
-
-	  case "$opt_mode" in
-	  clean)
-	    case " $library_names " in
-	    *" $dlname "*) ;;
-	    *) test -n "$dlname" && func_append rmfiles " $odir/$dlname" ;;
-	    esac
-	    test -n "$libdir" && func_append rmfiles " $odir/$name $odir/${name}i"
-	    ;;
-	  uninstall)
-	    if test -n "$library_names"; then
-	      # Do each command in the postuninstall commands.
-	      func_execute_cmds "$postuninstall_cmds" 'test "$rmforce" = yes || exit_status=1'
-	    fi
-
-	    if test -n "$old_library"; then
-	      # Do each command in the old_postuninstall commands.
-	      func_execute_cmds "$old_postuninstall_cmds" 'test "$rmforce" = yes || exit_status=1'
-	    fi
-	    # FIXME: should reinstall the best remaining shared library.
-	    ;;
-	  esac
-	fi
-	;;
-
-      *.lo)
-	# Possibly a libtool object, so verify it.
-	if func_lalib_p "$file"; then
-
-	  # Read the .lo file
-	  func_source $dir/$name
-
-	  # Add PIC object to the list of files to remove.
-	  if test -n "$pic_object" &&
-	     test "$pic_object" != none; then
-	    func_append rmfiles " $dir/$pic_object"
-	  fi
-
-	  # Add non-PIC object to the list of files to remove.
-	  if test -n "$non_pic_object" &&
-	     test "$non_pic_object" != none; then
-	    func_append rmfiles " $dir/$non_pic_object"
-	  fi
-	fi
-	;;
-
-      *)
-	if test "$opt_mode" = clean ; then
-	  noexename=$name
-	  case $file in
-	  *.exe)
-	    func_stripname '' '.exe' "$file"
-	    file=$func_stripname_result
-	    func_stripname '' '.exe' "$name"
-	    noexename=$func_stripname_result
-	    # $file with .exe has already been added to rmfiles,
-	    # add $file without .exe
-	    func_append rmfiles " $file"
-	    ;;
-	  esac
-	  # Do a test to see if this is a libtool program.
-	  if func_ltwrapper_p "$file"; then
-	    if func_ltwrapper_executable_p "$file"; then
-	      func_ltwrapper_scriptname "$file"
-	      relink_command=
-	      func_source $func_ltwrapper_scriptname_result
-	      func_append rmfiles " $func_ltwrapper_scriptname_result"
-	    else
-	      relink_command=
-	      func_source $dir/$noexename
-	    fi
-
-	    # note $name still contains .exe if it was in $file originally
-	    # as does the version of $file that was added into $rmfiles
-	    func_append rmfiles " $odir/$name $odir/${name}S.${objext}"
-	    if test "$fast_install" = yes && test -n "$relink_command"; then
-	      func_append rmfiles " $odir/lt-$name"
-	    fi
-	    if test "X$noexename" != "X$name" ; then
-	      func_append rmfiles " $odir/lt-${noexename}.c"
-	    fi
-	  fi
-	fi
-	;;
-      esac
-      func_show_eval "$RM $rmfiles" 'exit_status=1'
-    done
-
-    # Try to remove the ${objdir}s in the directories where we deleted files
-    for dir in $rmdirs; do
-      if test -d "$dir"; then
-	func_show_eval "rmdir $dir >/dev/null 2>&1"
-      fi
-    done
-
-    exit $exit_status
-}
-
-{ test "$opt_mode" = uninstall || test "$opt_mode" = clean; } &&
-    func_mode_uninstall ${1+"$@"}
-
-test -z "$opt_mode" && {
-  help="$generic_help"
-  func_fatal_help "you must specify a MODE"
-}
-
-test -z "$exec_cmd" && \
-  func_fatal_help "invalid operation mode \`$opt_mode'"
-
-if test -n "$exec_cmd"; then
-  eval exec "$exec_cmd"
-  exit $EXIT_FAILURE
-fi
-
-exit $exit_status
-
-
-# The TAGs below are defined such that we never get into a situation
-# in which we disable both kinds of libraries.  Given conflicting
-# choices, we go for a static library, that is the most portable,
-# since we can't tell whether shared libraries were disabled because
-# the user asked for that or because the platform doesn't support
-# them.  This is particularly important on AIX, because we don't
-# support having both static and shared libraries enabled at the same
-# time on that platform, so we default to a shared-only configuration.
-# If a disable-shared tag is given, we'll fallback to a static-only
-# configuration.  But we'll never go from static-only to shared-only.
-
-# ### BEGIN LIBTOOL TAG CONFIG: disable-shared
-build_libtool_libs=no
-build_old_libs=yes
-# ### END LIBTOOL TAG CONFIG: disable-shared
-
-# ### BEGIN LIBTOOL TAG CONFIG: disable-static
-build_old_libs=`case $build_libtool_libs in yes) echo no;; *) echo yes;; esac`
-# ### END LIBTOOL TAG CONFIG: disable-static
-
-# Local Variables:
-# mode:shell-script
-# sh-indentation:2
-# End:
-# vi:sw=2
-
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/missing b/sandbox/hurwitz.kroeker/src/float/cnf/missing
deleted file mode 100755
index 28055d2..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/missing
+++ /dev/null
@@ -1,376 +0,0 @@
-#! /bin/sh
-# Common stub for a few missing GNU programs while installing.
-
-scriptversion=2009-04-28.21; # UTC
-
-# Copyright (C) 1996, 1997, 1999, 2000, 2002, 2003, 2004, 2005, 2006,
-# 2008, 2009 Free Software Foundation, Inc.
-# Originally by Fran,cois Pinard <pinard@iro.umontreal.ca>, 1996.
-
-# This program is free software; you can redistribute it and/or modify
-# it under the terms of the GNU General Public License as published by
-# the Free Software Foundation; either version 2, or (at your option)
-# any later version.
-
-# This program is distributed in the hope that it will be useful,
-# but WITHOUT ANY WARRANTY; without even the implied warranty of
-# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
-# GNU General Public License for more details.
-
-# You should have received a copy of the GNU General Public License
-# along with this program.  If not, see <http://www.gnu.org/licenses/>.
-
-# As a special exception to the GNU General Public License, if you
-# distribute this file as part of a program that contains a
-# configuration script generated by Autoconf, you may include it under
-# the same distribution terms that you use for the rest of that program.
-
-if test $# -eq 0; then
-  echo 1>&2 "Try \`$0 --help' for more information"
-  exit 1
-fi
-
-run=:
-sed_output='s/.* --output[ =]\([^ ]*\).*/\1/p'
-sed_minuso='s/.* -o \([^ ]*\).*/\1/p'
-
-# In the cases where this matters, `missing' is being run in the
-# srcdir already.
-if test -f configure.ac; then
-  configure_ac=configure.ac
-else
-  configure_ac=configure.in
-fi
-
-msg="missing on your system"
-
-case $1 in
---run)
-  # Try to run requested program, and just exit if it succeeds.
-  run=
-  shift
-  "$@" && exit 0
-  # Exit code 63 means version mismatch.  This often happens
-  # when the user try to use an ancient version of a tool on
-  # a file that requires a minimum version.  In this case we
-  # we should proceed has if the program had been absent, or
-  # if --run hadn't been passed.
-  if test $? = 63; then
-    run=:
-    msg="probably too old"
-  fi
-  ;;
-
-  -h|--h|--he|--hel|--help)
-    echo "\
-$0 [OPTION]... PROGRAM [ARGUMENT]...
-
-Handle \`PROGRAM [ARGUMENT]...' for when PROGRAM is missing, or return an
-error status if there is no known handling for PROGRAM.
-
-Options:
-  -h, --help      display this help and exit
-  -v, --version   output version information and exit
-  --run           try to run the given command, and emulate it if it fails
-
-Supported PROGRAM values:
-  aclocal      touch file \`aclocal.m4'
-  autoconf     touch file \`configure'
-  autoheader   touch file \`config.h.in'
-  autom4te     touch the output file, or create a stub one
-  automake     touch all \`Makefile.in' files
-  bison        create \`y.tab.[ch]', if possible, from existing .[ch]
-  flex         create \`lex.yy.c', if possible, from existing .c
-  help2man     touch the output file
-  lex          create \`lex.yy.c', if possible, from existing .c
-  makeinfo     touch the output file
-  tar          try tar, gnutar, gtar, then tar without non-portable flags
-  yacc         create \`y.tab.[ch]', if possible, from existing .[ch]
-
-Version suffixes to PROGRAM as well as the prefixes \`gnu-', \`gnu', and
-\`g' are ignored when checking the name.
-
-Send bug reports to <bug-automake@gnu.org>."
-    exit $?
-    ;;
-
-  -v|--v|--ve|--ver|--vers|--versi|--versio|--version)
-    echo "missing $scriptversion (GNU Automake)"
-    exit $?
-    ;;
-
-  -*)
-    echo 1>&2 "$0: Unknown \`$1' option"
-    echo 1>&2 "Try \`$0 --help' for more information"
-    exit 1
-    ;;
-
-esac
-
-# normalize program name to check for.
-program=`echo "$1" | sed '
-  s/^gnu-//; t
-  s/^gnu//; t
-  s/^g//; t'`
-
-# Now exit if we have it, but it failed.  Also exit now if we
-# don't have it and --version was passed (most likely to detect
-# the program).  This is about non-GNU programs, so use $1 not
-# $program.
-case $1 in
-  lex*|yacc*)
-    # Not GNU programs, they don't have --version.
-    ;;
-
-  tar*)
-    if test -n "$run"; then
-       echo 1>&2 "ERROR: \`tar' requires --run"
-       exit 1
-    elif test "x$2" = "x--version" || test "x$2" = "x--help"; then
-       exit 1
-    fi
-    ;;
-
-  *)
-    if test -z "$run" && ($1 --version) > /dev/null 2>&1; then
-       # We have it, but it failed.
-       exit 1
-    elif test "x$2" = "x--version" || test "x$2" = "x--help"; then
-       # Could not run --version or --help.  This is probably someone
-       # running `$TOOL --version' or `$TOOL --help' to check whether
-       # $TOOL exists and not knowing $TOOL uses missing.
-       exit 1
-    fi
-    ;;
-esac
-
-# If it does not exist, or fails to run (possibly an outdated version),
-# try to emulate it.
-case $program in
-  aclocal*)
-    echo 1>&2 "\
-WARNING: \`$1' is $msg.  You should only need it if
-         you modified \`acinclude.m4' or \`${configure_ac}'.  You might want
-         to install the \`Automake' and \`Perl' packages.  Grab them from
-         any GNU archive site."
-    touch aclocal.m4
-    ;;
-
-  autoconf*)
-    echo 1>&2 "\
-WARNING: \`$1' is $msg.  You should only need it if
-         you modified \`${configure_ac}'.  You might want to install the
-         \`Autoconf' and \`GNU m4' packages.  Grab them from any GNU
-         archive site."
-    touch configure
-    ;;
-
-  autoheader*)
-    echo 1>&2 "\
-WARNING: \`$1' is $msg.  You should only need it if
-         you modified \`acconfig.h' or \`${configure_ac}'.  You might want
-         to install the \`Autoconf' and \`GNU m4' packages.  Grab them
-         from any GNU archive site."
-    files=`sed -n 's/^[ ]*A[CM]_CONFIG_HEADER(\([^)]*\)).*/\1/p' ${configure_ac}`
-    test -z "$files" && files="config.h"
-    touch_files=
-    for f in $files; do
-      case $f in
-      *:*) touch_files="$touch_files "`echo "$f" |
-				       sed -e 's/^[^:]*://' -e 's/:.*//'`;;
-      *) touch_files="$touch_files $f.in";;
-      esac
-    done
-    touch $touch_files
-    ;;
-
-  automake*)
-    echo 1>&2 "\
-WARNING: \`$1' is $msg.  You should only need it if
-         you modified \`Makefile.am', \`acinclude.m4' or \`${configure_ac}'.
-         You might want to install the \`Automake' and \`Perl' packages.
-         Grab them from any GNU archive site."
-    find . -type f -name Makefile.am -print |
-	   sed 's/\.am$/.in/' |
-	   while read f; do touch "$f"; done
-    ;;
-
-  autom4te*)
-    echo 1>&2 "\
-WARNING: \`$1' is needed, but is $msg.
-         You might have modified some files without having the
-         proper tools for further handling them.
-         You can get \`$1' as part of \`Autoconf' from any GNU
-         archive site."
-
-    file=`echo "$*" | sed -n "$sed_output"`
-    test -z "$file" && file=`echo "$*" | sed -n "$sed_minuso"`
-    if test -f "$file"; then
-	touch $file
-    else
-	test -z "$file" || exec >$file
-	echo "#! /bin/sh"
-	echo "# Created by GNU Automake missing as a replacement of"
-	echo "#  $ $@"
-	echo "exit 0"
-	chmod +x $file
-	exit 1
-    fi
-    ;;
-
-  bison*|yacc*)
-    echo 1>&2 "\
-WARNING: \`$1' $msg.  You should only need it if
-         you modified a \`.y' file.  You may need the \`Bison' package
-         in order for those modifications to take effect.  You can get
-         \`Bison' from any GNU archive site."
-    rm -f y.tab.c y.tab.h
-    if test $# -ne 1; then
-        eval LASTARG="\${$#}"
-	case $LASTARG in
-	*.y)
-	    SRCFILE=`echo "$LASTARG" | sed 's/y$/c/'`
-	    if test -f "$SRCFILE"; then
-	         cp "$SRCFILE" y.tab.c
-	    fi
-	    SRCFILE=`echo "$LASTARG" | sed 's/y$/h/'`
-	    if test -f "$SRCFILE"; then
-	         cp "$SRCFILE" y.tab.h
-	    fi
-	  ;;
-	esac
-    fi
-    if test ! -f y.tab.h; then
-	echo >y.tab.h
-    fi
-    if test ! -f y.tab.c; then
-	echo 'main() { return 0; }' >y.tab.c
-    fi
-    ;;
-
-  lex*|flex*)
-    echo 1>&2 "\
-WARNING: \`$1' is $msg.  You should only need it if
-         you modified a \`.l' file.  You may need the \`Flex' package
-         in order for those modifications to take effect.  You can get
-         \`Flex' from any GNU archive site."
-    rm -f lex.yy.c
-    if test $# -ne 1; then
-        eval LASTARG="\${$#}"
-	case $LASTARG in
-	*.l)
-	    SRCFILE=`echo "$LASTARG" | sed 's/l$/c/'`
-	    if test -f "$SRCFILE"; then
-	         cp "$SRCFILE" lex.yy.c
-	    fi
-	  ;;
-	esac
-    fi
-    if test ! -f lex.yy.c; then
-	echo 'main() { return 0; }' >lex.yy.c
-    fi
-    ;;
-
-  help2man*)
-    echo 1>&2 "\
-WARNING: \`$1' is $msg.  You should only need it if
-	 you modified a dependency of a manual page.  You may need the
-	 \`Help2man' package in order for those modifications to take
-	 effect.  You can get \`Help2man' from any GNU archive site."
-
-    file=`echo "$*" | sed -n "$sed_output"`
-    test -z "$file" && file=`echo "$*" | sed -n "$sed_minuso"`
-    if test -f "$file"; then
-	touch $file
-    else
-	test -z "$file" || exec >$file
-	echo ".ab help2man is required to generate this page"
-	exit $?
-    fi
-    ;;
-
-  makeinfo*)
-    echo 1>&2 "\
-WARNING: \`$1' is $msg.  You should only need it if
-         you modified a \`.texi' or \`.texinfo' file, or any other file
-         indirectly affecting the aspect of the manual.  The spurious
-         call might also be the consequence of using a buggy \`make' (AIX,
-         DU, IRIX).  You might want to install the \`Texinfo' package or
-         the \`GNU make' package.  Grab either from any GNU archive site."
-    # The file to touch is that specified with -o ...
-    file=`echo "$*" | sed -n "$sed_output"`
-    test -z "$file" && file=`echo "$*" | sed -n "$sed_minuso"`
-    if test -z "$file"; then
-      # ... or it is the one specified with @setfilename ...
-      infile=`echo "$*" | sed 's/.* \([^ ]*\) *$/\1/'`
-      file=`sed -n '
-	/^@setfilename/{
-	  s/.* \([^ ]*\) *$/\1/
-	  p
-	  q
-	}' $infile`
-      # ... or it is derived from the source name (dir/f.texi becomes f.info)
-      test -z "$file" && file=`echo "$infile" | sed 's,.*/,,;s,.[^.]*$,,'`.info
-    fi
-    # If the file does not exist, the user really needs makeinfo;
-    # let's fail without touching anything.
-    test -f $file || exit 1
-    touch $file
-    ;;
-
-  tar*)
-    shift
-
-    # We have already tried tar in the generic part.
-    # Look for gnutar/gtar before invocation to avoid ugly error
-    # messages.
-    if (gnutar --version > /dev/null 2>&1); then
-       gnutar "$@" && exit 0
-    fi
-    if (gtar --version > /dev/null 2>&1); then
-       gtar "$@" && exit 0
-    fi
-    firstarg="$1"
-    if shift; then
-	case $firstarg in
-	*o*)
-	    firstarg=`echo "$firstarg" | sed s/o//`
-	    tar "$firstarg" "$@" && exit 0
-	    ;;
-	esac
-	case $firstarg in
-	*h*)
-	    firstarg=`echo "$firstarg" | sed s/h//`
-	    tar "$firstarg" "$@" && exit 0
-	    ;;
-	esac
-    fi
-
-    echo 1>&2 "\
-WARNING: I can't seem to be able to run \`tar' with the given arguments.
-         You may want to install GNU tar or Free paxutils, or check the
-         command line arguments."
-    exit 1
-    ;;
-
-  *)
-    echo 1>&2 "\
-WARNING: \`$1' is needed, and is $msg.
-         You might have modified some files without having the
-         proper tools for further handling them.  Check the \`README' file,
-         it often tells you about the needed prerequisites for installing
-         this package.  You may also peek at any GNU archive site, in case
-         some other package would contain this missing \`$1' program."
-    exit 1
-    ;;
-esac
-
-exit 0
-
-# Local variables:
-# eval: (add-hook 'write-file-hooks 'time-stamp)
-# time-stamp-start: "scriptversion="
-# time-stamp-format: "%:y-%02m-%02d.%02H"
-# time-stamp-time-zone: "UTC"
-# time-stamp-end: "; # UTC"
-# End:
diff --git a/sandbox/hurwitz.kroeker/src/float/cnf/pkgconfig.h.in b/sandbox/hurwitz.kroeker/src/float/cnf/pkgconfig.h.in
deleted file mode 100644
index 9327486..0000000
--- a/sandbox/hurwitz.kroeker/src/float/cnf/pkgconfig.h.in
+++ /dev/null
@@ -1,336 +0,0 @@
-/* cnf/pkgconfig.h.in.  Generated from configure.ac by autoheader.  */
-
-/* Define to 1 if the `closedir' function returns void instead of `int'. */
-#undef CLOSEDIR_VOID
-
-/* Define to 1 if you have the `accept' function. */
-#undef HAVE_ACCEPT
-
-/* Define to 1 if you have the `bind' function. */
-#undef HAVE_BIND
-
-/* Define to 1 if you have the `chmod' function. */
-#undef HAVE_CHMOD
-
-/* Define to 1 if your system has a working `chown' function. */
-#undef HAVE_CHOWN
-
-/* Define to 1 if you have the `closedir' function. */
-#undef HAVE_CLOSEDIR
-
-/* Define to 1 if you have the `connect' function. */
-#undef HAVE_CONNECT
-
-/* Define to 1 if you have the <dirent.h> header file, and it defines `DIR'.
-   */
-#undef HAVE_DIRENT_H
-
-/* Define to 1 if you have the <dlfcn.h> header file. */
-#undef HAVE_DLFCN_H
-
-/* Define to 1 if you have the `dup' function. */
-#undef HAVE_DUP
-
-/* Define to 1 if you have the `dup2' function. */
-#undef HAVE_DUP2
-
-/* Define to 1 if you have the `fchmod' function. */
-#undef HAVE_FCHMOD
-
-/* Define to 1 if you have the `fchown' function. */
-#undef HAVE_FCHOWN
-
-/* Define to 1 if you have the <fcntl.h> header file. */
-#undef HAVE_FCNTL_H
-
-/* Define to 1 if you have the `fork' function. */
-#undef HAVE_FORK
-
-/* Define to 1 if you have the `fstat' function. */
-#undef HAVE_FSTAT
-
-/* Define to 1 if you have the `gethostbyname' function. */
-#undef HAVE_GETHOSTBYNAME
-
-/* Define to 1 if you have the `gethostname' function. */
-#undef HAVE_GETHOSTNAME
-
-/* Define to 1 if you have the `getpid' function. */
-#undef HAVE_GETPID
-
-/* Define to 1 if you have the `getppid' function. */
-#undef HAVE_GETPPID
-
-/* Define to 1 if you have the `getprotobyname' function. */
-#undef HAVE_GETPROTOBYNAME
-
-/* Define to 1 if you have the `getsockname' function. */
-#undef HAVE_GETSOCKNAME
-
-/* Define to 1 if you have the `getsockopt' function. */
-#undef HAVE_GETSOCKOPT
-
-/* Define to 1 if you have the `gettimeofday' function. */
-#undef HAVE_GETTIMEOFDAY
-
-/* Define to 1 if you have the `gmtime' function. */
-#undef HAVE_GMTIME
-
-/* Define to 1 if you have the <inttypes.h> header file. */
-#undef HAVE_INTTYPES_H
-
-/* Define to 1 if you have the `kill' function. */
-#undef HAVE_KILL
-
-/* Define to 1 if you have the `lchown' function. */
-#undef HAVE_LCHOWN
-
-/* Define to 1 if you have the `link' function. */
-#undef HAVE_LINK
-
-/* Define to 1 if you have the `listen' function. */
-#undef HAVE_LISTEN
-
-/* Define to 1 if you have the `localtime' function. */
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-
-/* Define to 1 if you have the `lstat' function. */
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-
-/* Define to 1 if `lstat' has the bug that it succeeds when given the
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-
-/* Define to 1 if you have the <memory.h> header file. */
-#undef HAVE_MEMORY_H
-
-/* Define to 1 if you have the `memset' function. */
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-
-/* Define to 1 if you have the `mkdir' function. */
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-/* Define to 1 if you have the `mkfifo' function. */
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-/* Define to 1 if you have the `mknod' function. */
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-/* Define to 1 if you have the <ndir.h> header file, and it defines `DIR'. */
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-/* Define to 1 if you have the <netdb.h> header file. */
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-/* Define to 1 if `st_rdev' is a member of `struct stat'. */
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-/* Define to 1 if you have the <sys/dir.h> header file, and it defines `DIR'.
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-/* Define to 1 if you have the <sys/socket.h> header file. */
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-/* Define to 1 if you have the <sys/stat.h> header file. */
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-/* Define to 1 if you have the <sys/time.h> header file. */
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-/* Define to 1 if you have the <sys/types.h> header file. */
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-/* Define to 1 if you have <sys/wait.h> that is POSIX.1 compatible. */
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-/* Define to 1 if you have the `telldir' function. */
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-/* Define to 1 if you have the <time.h> header file. */
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-/* Define to 1 if you have the <unistd.h> header file. */
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-/* Define to 1 if you have the `unlink' function. */
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-/* Define to 1 if you have the <vfork.h> header file. */
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-/* Define to 1 if `fork' works. */
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diff --git a/sandbox/hurwitz.kroeker/src/float/configure b/sandbox/hurwitz.kroeker/src/float/configure
deleted file mode 100755
index 8acedf5..0000000
--- a/sandbox/hurwitz.kroeker/src/float/configure
+++ /dev/null
@@ -1,19596 +0,0 @@
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-\`configure' configures float 4.0  to adapt to many kinds of systems.
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-Usage: $0 [OPTION]... [VAR=VALUE]...
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-Optional Features:
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-
-Optional Packages:
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-  --with-gmp-include=<location>
-    Location at which the GMP include files were installed.
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-    Location at which the GMP library files were installed.
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-    Location at which the MPFR library was installed.
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-
-  --with-mpfr-include=<location>
-    Location at which the MPFR include files were installed.
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-    Location at which the MPFR library files were installed.
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-    Location at which the MPFI library was installed.
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-
-  --with-mpfi-include=<location>
-    Location at which the MPFI include files were installed.
-  --with-mpfi-lib=<location>
-    Location at which the MPFI library files were installed.
-  --with-mpc=<path>|yes|no|extern
-    Location at which the MPC library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of mpc in the subdirectory extern/.
-
-  --with-mpc-include=<location>
-    Location at which the MPC include files were installed.
-  --with-mpc-lib=<location>
-    Location at which the MPC library files were installed.
-  --with-fplll=<path>|yes|no|extern
-    Location at which the FPLLL library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
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-    library. The special value "extern", which is the default, asks Float
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-
-  --with-fplll-include=<location>
-    Location at which the FPLLL include files were installed.
-  --with-fplll-lib=<location>
-    Location at which the FPLLL library files were installed.
-  --with-cxsc=<path>|yes|no|extern
-    Location at which the CXSC library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
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-    library. The special value "extern", which is the default, asks Float
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-
-  --with-cxsc-include=<location>
-    Location at which the CXSC include files were installed.
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-    Location at which the CXSC library files were installed.
-
-Some influential environment variables:
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-  GAPDIR      Location of the GAP root directory, e.g. ../..
-  CONFIGNAME  Name of GAP build configuration
-
-Use these variables to override the choices made by `configure' or to help
-it to find libraries and programs with nonstandard names/locations.
-
-Report bugs to <laurent.bartholdi@gmail.com >.
-_ACEOF
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-      $ac_path_GREP_found && break 3
-    done
-  done
-  done
-IFS=$as_save_IFS
-  if test -z "$ac_cv_path_GREP"; then
-    as_fn_error $? "no acceptable grep could be found in $PATH$PATH_SEPARATOR/usr/xpg4/bin" "$LINENO" 5
-  fi
-else
-  ac_cv_path_GREP=$GREP
-fi
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_path_GREP" >&5
-$as_echo "$ac_cv_path_GREP" >&6; }
- GREP="$ac_cv_path_GREP"
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for egrep" >&5
-$as_echo_n "checking for egrep... " >&6; }
-if test "${ac_cv_path_EGREP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if echo a | $GREP -E '(a|b)' >/dev/null 2>&1
-   then ac_cv_path_EGREP="$GREP -E"
-   else
-     if test -z "$EGREP"; then
-  ac_path_EGREP_found=false
-  # Loop through the user's path and test for each of PROGNAME-LIST
-  as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH$PATH_SEPARATOR/usr/xpg4/bin
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_prog in egrep; do
-    for ac_exec_ext in '' $ac_executable_extensions; do
-      ac_path_EGREP="$as_dir/$ac_prog$ac_exec_ext"
-      { test -f "$ac_path_EGREP" && $as_test_x "$ac_path_EGREP"; } || continue
-# Check for GNU ac_path_EGREP and select it if it is found.
-  # Check for GNU $ac_path_EGREP
-case `"$ac_path_EGREP" --version 2>&1` in
-*GNU*)
-  ac_cv_path_EGREP="$ac_path_EGREP" ac_path_EGREP_found=:;;
-*)
-  ac_count=0
-  $as_echo_n 0123456789 >"conftest.in"
-  while :
-  do
-    cat "conftest.in" "conftest.in" >"conftest.tmp"
-    mv "conftest.tmp" "conftest.in"
-    cp "conftest.in" "conftest.nl"
-    $as_echo 'EGREP' >> "conftest.nl"
-    "$ac_path_EGREP" 'EGREP$' < "conftest.nl" >"conftest.out" 2>/dev/null || break
-    diff "conftest.out" "conftest.nl" >/dev/null 2>&1 || break
-    as_fn_arith $ac_count + 1 && ac_count=$as_val
-    if test $ac_count -gt ${ac_path_EGREP_max-0}; then
-      # Best one so far, save it but keep looking for a better one
-      ac_cv_path_EGREP="$ac_path_EGREP"
-      ac_path_EGREP_max=$ac_count
-    fi
-    # 10*(2^10) chars as input seems more than enough
-    test $ac_count -gt 10 && break
-  done
-  rm -f conftest.in conftest.tmp conftest.nl conftest.out;;
-esac
-
-      $ac_path_EGREP_found && break 3
-    done
-  done
-  done
-IFS=$as_save_IFS
-  if test -z "$ac_cv_path_EGREP"; then
-    as_fn_error $? "no acceptable egrep could be found in $PATH$PATH_SEPARATOR/usr/xpg4/bin" "$LINENO" 5
-  fi
-else
-  ac_cv_path_EGREP=$EGREP
-fi
-
-   fi
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_path_EGREP" >&5
-$as_echo "$ac_cv_path_EGREP" >&6; }
- EGREP="$ac_cv_path_EGREP"
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for fgrep" >&5
-$as_echo_n "checking for fgrep... " >&6; }
-if test "${ac_cv_path_FGREP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if echo 'ab*c' | $GREP -F 'ab*c' >/dev/null 2>&1
-   then ac_cv_path_FGREP="$GREP -F"
-   else
-     if test -z "$FGREP"; then
-  ac_path_FGREP_found=false
-  # Loop through the user's path and test for each of PROGNAME-LIST
-  as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH$PATH_SEPARATOR/usr/xpg4/bin
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_prog in fgrep; do
-    for ac_exec_ext in '' $ac_executable_extensions; do
-      ac_path_FGREP="$as_dir/$ac_prog$ac_exec_ext"
-      { test -f "$ac_path_FGREP" && $as_test_x "$ac_path_FGREP"; } || continue
-# Check for GNU ac_path_FGREP and select it if it is found.
-  # Check for GNU $ac_path_FGREP
-case `"$ac_path_FGREP" --version 2>&1` in
-*GNU*)
-  ac_cv_path_FGREP="$ac_path_FGREP" ac_path_FGREP_found=:;;
-*)
-  ac_count=0
-  $as_echo_n 0123456789 >"conftest.in"
-  while :
-  do
-    cat "conftest.in" "conftest.in" >"conftest.tmp"
-    mv "conftest.tmp" "conftest.in"
-    cp "conftest.in" "conftest.nl"
-    $as_echo 'FGREP' >> "conftest.nl"
-    "$ac_path_FGREP" FGREP < "conftest.nl" >"conftest.out" 2>/dev/null || break
-    diff "conftest.out" "conftest.nl" >/dev/null 2>&1 || break
-    as_fn_arith $ac_count + 1 && ac_count=$as_val
-    if test $ac_count -gt ${ac_path_FGREP_max-0}; then
-      # Best one so far, save it but keep looking for a better one
-      ac_cv_path_FGREP="$ac_path_FGREP"
-      ac_path_FGREP_max=$ac_count
-    fi
-    # 10*(2^10) chars as input seems more than enough
-    test $ac_count -gt 10 && break
-  done
-  rm -f conftest.in conftest.tmp conftest.nl conftest.out;;
-esac
-
-      $ac_path_FGREP_found && break 3
-    done
-  done
-  done
-IFS=$as_save_IFS
-  if test -z "$ac_cv_path_FGREP"; then
-    as_fn_error $? "no acceptable fgrep could be found in $PATH$PATH_SEPARATOR/usr/xpg4/bin" "$LINENO" 5
-  fi
-else
-  ac_cv_path_FGREP=$FGREP
-fi
-
-   fi
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_path_FGREP" >&5
-$as_echo "$ac_cv_path_FGREP" >&6; }
- FGREP="$ac_cv_path_FGREP"
-
-
-test -z "$GREP" && GREP=grep
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-# Check whether --with-gnu-ld was given.
-if test "${with_gnu_ld+set}" = set; then :
-  withval=$with_gnu_ld; test "$withval" = no || with_gnu_ld=yes
-else
-  with_gnu_ld=no
-fi
-
-ac_prog=ld
-if test "$GCC" = yes; then
-  # Check if gcc -print-prog-name=ld gives a path.
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for ld used by $CC" >&5
-$as_echo_n "checking for ld used by $CC... " >&6; }
-  case $host in
-  *-*-mingw*)
-    # gcc leaves a trailing carriage return which upsets mingw
-    ac_prog=`($CC -print-prog-name=ld) 2>&5 | tr -d '\015'` ;;
-  *)
-    ac_prog=`($CC -print-prog-name=ld) 2>&5` ;;
-  esac
-  case $ac_prog in
-    # Accept absolute paths.
-    [\\/]* | ?:[\\/]*)
-      re_direlt='/[^/][^/]*/\.\./'
-      # Canonicalize the pathname of ld
-      ac_prog=`$ECHO "$ac_prog"| $SED 's%\\\\%/%g'`
-      while $ECHO "$ac_prog" | $GREP "$re_direlt" > /dev/null 2>&1; do
-	ac_prog=`$ECHO $ac_prog| $SED "s%$re_direlt%/%"`
-      done
-      test -z "$LD" && LD="$ac_prog"
-      ;;
-  "")
-    # If it fails, then pretend we aren't using GCC.
-    ac_prog=ld
-    ;;
-  *)
-    # If it is relative, then search for the first ld in PATH.
-    with_gnu_ld=unknown
-    ;;
-  esac
-elif test "$with_gnu_ld" = yes; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for GNU ld" >&5
-$as_echo_n "checking for GNU ld... " >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for non-GNU ld" >&5
-$as_echo_n "checking for non-GNU ld... " >&6; }
-fi
-if test "${lt_cv_path_LD+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -z "$LD"; then
-  lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-  for ac_dir in $PATH; do
-    IFS="$lt_save_ifs"
-    test -z "$ac_dir" && ac_dir=.
-    if test -f "$ac_dir/$ac_prog" || test -f "$ac_dir/$ac_prog$ac_exeext"; then
-      lt_cv_path_LD="$ac_dir/$ac_prog"
-      # Check to see if the program is GNU ld.  I'd rather use --version,
-      # but apparently some variants of GNU ld only accept -v.
-      # Break only if it was the GNU/non-GNU ld that we prefer.
-      case `"$lt_cv_path_LD" -v 2>&1 </dev/null` in
-      *GNU* | *'with BFD'*)
-	test "$with_gnu_ld" != no && break
-	;;
-      *)
-	test "$with_gnu_ld" != yes && break
-	;;
-      esac
-    fi
-  done
-  IFS="$lt_save_ifs"
-else
-  lt_cv_path_LD="$LD" # Let the user override the test with a path.
-fi
-fi
-
-LD="$lt_cv_path_LD"
-if test -n "$LD"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $LD" >&5
-$as_echo "$LD" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-test -z "$LD" && as_fn_error $? "no acceptable ld found in \$PATH" "$LINENO" 5
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking if the linker ($LD) is GNU ld" >&5
-$as_echo_n "checking if the linker ($LD) is GNU ld... " >&6; }
-if test "${lt_cv_prog_gnu_ld+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  # I'd rather use --version here, but apparently some GNU lds only accept -v.
-case `$LD -v 2>&1 </dev/null` in
-*GNU* | *'with BFD'*)
-  lt_cv_prog_gnu_ld=yes
-  ;;
-*)
-  lt_cv_prog_gnu_ld=no
-  ;;
-esac
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_gnu_ld" >&5
-$as_echo "$lt_cv_prog_gnu_ld" >&6; }
-with_gnu_ld=$lt_cv_prog_gnu_ld
-
-
-
-
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for BSD- or MS-compatible name lister (nm)" >&5
-$as_echo_n "checking for BSD- or MS-compatible name lister (nm)... " >&6; }
-if test "${lt_cv_path_NM+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$NM"; then
-  # Let the user override the test.
-  lt_cv_path_NM="$NM"
-else
-  lt_nm_to_check="${ac_tool_prefix}nm"
-  if test -n "$ac_tool_prefix" && test "$build" = "$host"; then
-    lt_nm_to_check="$lt_nm_to_check nm"
-  fi
-  for lt_tmp_nm in $lt_nm_to_check; do
-    lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-    for ac_dir in $PATH /usr/ccs/bin/elf /usr/ccs/bin /usr/ucb /bin; do
-      IFS="$lt_save_ifs"
-      test -z "$ac_dir" && ac_dir=.
-      tmp_nm="$ac_dir/$lt_tmp_nm"
-      if test -f "$tmp_nm" || test -f "$tmp_nm$ac_exeext" ; then
-	# Check to see if the nm accepts a BSD-compat flag.
-	# Adding the `sed 1q' prevents false positives on HP-UX, which says:
-	#   nm: unknown option "B" ignored
-	# Tru64's nm complains that /dev/null is an invalid object file
-	case `"$tmp_nm" -B /dev/null 2>&1 | sed '1q'` in
-	*/dev/null* | *'Invalid file or object type'*)
-	  lt_cv_path_NM="$tmp_nm -B"
-	  break
-	  ;;
-	*)
-	  case `"$tmp_nm" -p /dev/null 2>&1 | sed '1q'` in
-	  */dev/null*)
-	    lt_cv_path_NM="$tmp_nm -p"
-	    break
-	    ;;
-	  *)
-	    lt_cv_path_NM=${lt_cv_path_NM="$tmp_nm"} # keep the first match, but
-	    continue # so that we can try to find one that supports BSD flags
-	    ;;
-	  esac
-	  ;;
-	esac
-      fi
-    done
-    IFS="$lt_save_ifs"
-  done
-  : ${lt_cv_path_NM=no}
-fi
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_path_NM" >&5
-$as_echo "$lt_cv_path_NM" >&6; }
-if test "$lt_cv_path_NM" != "no"; then
-  NM="$lt_cv_path_NM"
-else
-  # Didn't find any BSD compatible name lister, look for dumpbin.
-  if test -n "$DUMPBIN"; then :
-    # Let the user override the test.
-  else
-    if test -n "$ac_tool_prefix"; then
-  for ac_prog in dumpbin "link -dump"
-  do
-    # Extract the first word of "$ac_tool_prefix$ac_prog", so it can be a program name with args.
-set dummy $ac_tool_prefix$ac_prog; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_DUMPBIN+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$DUMPBIN"; then
-  ac_cv_prog_DUMPBIN="$DUMPBIN" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_DUMPBIN="$ac_tool_prefix$ac_prog"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-DUMPBIN=$ac_cv_prog_DUMPBIN
-if test -n "$DUMPBIN"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $DUMPBIN" >&5
-$as_echo "$DUMPBIN" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-    test -n "$DUMPBIN" && break
-  done
-fi
-if test -z "$DUMPBIN"; then
-  ac_ct_DUMPBIN=$DUMPBIN
-  for ac_prog in dumpbin "link -dump"
-do
-  # Extract the first word of "$ac_prog", so it can be a program name with args.
-set dummy $ac_prog; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_DUMPBIN+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_DUMPBIN"; then
-  ac_cv_prog_ac_ct_DUMPBIN="$ac_ct_DUMPBIN" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_DUMPBIN="$ac_prog"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_DUMPBIN=$ac_cv_prog_ac_ct_DUMPBIN
-if test -n "$ac_ct_DUMPBIN"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_DUMPBIN" >&5
-$as_echo "$ac_ct_DUMPBIN" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-  test -n "$ac_ct_DUMPBIN" && break
-done
-
-  if test "x$ac_ct_DUMPBIN" = x; then
-    DUMPBIN=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    DUMPBIN=$ac_ct_DUMPBIN
-  fi
-fi
-
-    case `$DUMPBIN -symbols /dev/null 2>&1 | sed '1q'` in
-    *COFF*)
-      DUMPBIN="$DUMPBIN -symbols"
-      ;;
-    *)
-      DUMPBIN=:
-      ;;
-    esac
-  fi
-
-  if test "$DUMPBIN" != ":"; then
-    NM="$DUMPBIN"
-  fi
-fi
-test -z "$NM" && NM=nm
-
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking the name lister ($NM) interface" >&5
-$as_echo_n "checking the name lister ($NM) interface... " >&6; }
-if test "${lt_cv_nm_interface+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_nm_interface="BSD nm"
-  echo "int some_variable = 0;" > conftest.$ac_ext
-  (eval echo "\"\$as_me:$LINENO: $ac_compile\"" >&5)
-  (eval "$ac_compile" 2>conftest.err)
-  cat conftest.err >&5
-  (eval echo "\"\$as_me:$LINENO: $NM \\\"conftest.$ac_objext\\\"\"" >&5)
-  (eval "$NM \"conftest.$ac_objext\"" 2>conftest.err > conftest.out)
-  cat conftest.err >&5
-  (eval echo "\"\$as_me:$LINENO: output\"" >&5)
-  cat conftest.out >&5
-  if $GREP 'External.*some_variable' conftest.out > /dev/null; then
-    lt_cv_nm_interface="MS dumpbin"
-  fi
-  rm -f conftest*
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_nm_interface" >&5
-$as_echo "$lt_cv_nm_interface" >&6; }
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether ln -s works" >&5
-$as_echo_n "checking whether ln -s works... " >&6; }
-LN_S=$as_ln_s
-if test "$LN_S" = "ln -s"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: yes" >&5
-$as_echo "yes" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no, using $LN_S" >&5
-$as_echo "no, using $LN_S" >&6; }
-fi
-
-# find the maximum length of command line arguments
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking the maximum length of command line arguments" >&5
-$as_echo_n "checking the maximum length of command line arguments... " >&6; }
-if test "${lt_cv_sys_max_cmd_len+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-    i=0
-  teststring="ABCD"
-
-  case $build_os in
-  msdosdjgpp*)
-    # On DJGPP, this test can blow up pretty badly due to problems in libc
-    # (any single argument exceeding 2000 bytes causes a buffer overrun
-    # during glob expansion).  Even if it were fixed, the result of this
-    # check would be larger than it should be.
-    lt_cv_sys_max_cmd_len=12288;    # 12K is about right
-    ;;
-
-  gnu*)
-    # Under GNU Hurd, this test is not required because there is
-    # no limit to the length of command line arguments.
-    # Libtool will interpret -1 as no limit whatsoever
-    lt_cv_sys_max_cmd_len=-1;
-    ;;
-
-  cygwin* | mingw* | cegcc*)
-    # On Win9x/ME, this test blows up -- it succeeds, but takes
-    # about 5 minutes as the teststring grows exponentially.
-    # Worse, since 9x/ME are not pre-emptively multitasking,
-    # you end up with a "frozen" computer, even though with patience
-    # the test eventually succeeds (with a max line length of 256k).
-    # Instead, let's just punt: use the minimum linelength reported by
-    # all of the supported platforms: 8192 (on NT/2K/XP).
-    lt_cv_sys_max_cmd_len=8192;
-    ;;
-
-  mint*)
-    # On MiNT this can take a long time and run out of memory.
-    lt_cv_sys_max_cmd_len=8192;
-    ;;
-
-  amigaos*)
-    # On AmigaOS with pdksh, this test takes hours, literally.
-    # So we just punt and use a minimum line length of 8192.
-    lt_cv_sys_max_cmd_len=8192;
-    ;;
-
-  netbsd* | freebsd* | openbsd* | darwin* | dragonfly*)
-    # This has been around since 386BSD, at least.  Likely further.
-    if test -x /sbin/sysctl; then
-      lt_cv_sys_max_cmd_len=`/sbin/sysctl -n kern.argmax`
-    elif test -x /usr/sbin/sysctl; then
-      lt_cv_sys_max_cmd_len=`/usr/sbin/sysctl -n kern.argmax`
-    else
-      lt_cv_sys_max_cmd_len=65536	# usable default for all BSDs
-    fi
-    # And add a safety zone
-    lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \/ 4`
-    lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \* 3`
-    ;;
-
-  interix*)
-    # We know the value 262144 and hardcode it with a safety zone (like BSD)
-    lt_cv_sys_max_cmd_len=196608
-    ;;
-
-  os2*)
-    # The test takes a long time on OS/2.
-    lt_cv_sys_max_cmd_len=8192
-    ;;
-
-  osf*)
-    # Dr. Hans Ekkehard Plesser reports seeing a kernel panic running configure
-    # due to this test when exec_disable_arg_limit is 1 on Tru64. It is not
-    # nice to cause kernel panics so lets avoid the loop below.
-    # First set a reasonable default.
-    lt_cv_sys_max_cmd_len=16384
-    #
-    if test -x /sbin/sysconfig; then
-      case `/sbin/sysconfig -q proc exec_disable_arg_limit` in
-        *1*) lt_cv_sys_max_cmd_len=-1 ;;
-      esac
-    fi
-    ;;
-  sco3.2v5*)
-    lt_cv_sys_max_cmd_len=102400
-    ;;
-  sysv5* | sco5v6* | sysv4.2uw2*)
-    kargmax=`grep ARG_MAX /etc/conf/cf.d/stune 2>/dev/null`
-    if test -n "$kargmax"; then
-      lt_cv_sys_max_cmd_len=`echo $kargmax | sed 's/.*[	 ]//'`
-    else
-      lt_cv_sys_max_cmd_len=32768
-    fi
-    ;;
-  *)
-    lt_cv_sys_max_cmd_len=`(getconf ARG_MAX) 2> /dev/null`
-    if test -n "$lt_cv_sys_max_cmd_len"; then
-      lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \/ 4`
-      lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \* 3`
-    else
-      # Make teststring a little bigger before we do anything with it.
-      # a 1K string should be a reasonable start.
-      for i in 1 2 3 4 5 6 7 8 ; do
-        teststring=$teststring$teststring
-      done
-      SHELL=${SHELL-${CONFIG_SHELL-/bin/sh}}
-      # If test is not a shell built-in, we'll probably end up computing a
-      # maximum length that is only half of the actual maximum length, but
-      # we can't tell.
-      while { test "X"`env echo "$teststring$teststring" 2>/dev/null` \
-	         = "X$teststring$teststring"; } >/dev/null 2>&1 &&
-	      test $i != 17 # 1/2 MB should be enough
-      do
-        i=`expr $i + 1`
-        teststring=$teststring$teststring
-      done
-      # Only check the string length outside the loop.
-      lt_cv_sys_max_cmd_len=`expr "X$teststring" : ".*" 2>&1`
-      teststring=
-      # Add a significant safety factor because C++ compilers can tack on
-      # massive amounts of additional arguments before passing them to the
-      # linker.  It appears as though 1/2 is a usable value.
-      lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \/ 2`
-    fi
-    ;;
-  esac
-
-fi
-
-if test -n $lt_cv_sys_max_cmd_len ; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_sys_max_cmd_len" >&5
-$as_echo "$lt_cv_sys_max_cmd_len" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: none" >&5
-$as_echo "none" >&6; }
-fi
-max_cmd_len=$lt_cv_sys_max_cmd_len
-
-
-
-
-
-
-: ${CP="cp -f"}
-: ${MV="mv -f"}
-: ${RM="rm -f"}
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether the shell understands some XSI constructs" >&5
-$as_echo_n "checking whether the shell understands some XSI constructs... " >&6; }
-# Try some XSI features
-xsi_shell=no
-( _lt_dummy="a/b/c"
-  test "${_lt_dummy##*/},${_lt_dummy%/*},${_lt_dummy#??}"${_lt_dummy%"$_lt_dummy"}, \
-      = c,a/b,b/c, \
-    && eval 'test $(( 1 + 1 )) -eq 2 \
-    && test "${#_lt_dummy}" -eq 5' ) >/dev/null 2>&1 \
-  && xsi_shell=yes
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $xsi_shell" >&5
-$as_echo "$xsi_shell" >&6; }
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether the shell understands \"+=\"" >&5
-$as_echo_n "checking whether the shell understands \"+=\"... " >&6; }
-lt_shell_append=no
-( foo=bar; set foo baz; eval "$1+=\$2" && test "$foo" = barbaz ) \
-    >/dev/null 2>&1 \
-  && lt_shell_append=yes
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_shell_append" >&5
-$as_echo "$lt_shell_append" >&6; }
-
-
-if ( (MAIL=60; unset MAIL) || exit) >/dev/null 2>&1; then
-  lt_unset=unset
-else
-  lt_unset=false
-fi
-
-
-
-
-
-# test EBCDIC or ASCII
-case `echo X|tr X '\101'` in
- A) # ASCII based system
-    # \n is not interpreted correctly by Solaris 8 /usr/ucb/tr
-  lt_SP2NL='tr \040 \012'
-  lt_NL2SP='tr \015\012 \040\040'
-  ;;
- *) # EBCDIC based system
-  lt_SP2NL='tr \100 \n'
-  lt_NL2SP='tr \r\n \100\100'
-  ;;
-esac
-
-
-
-
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking how to convert $build file names to $host format" >&5
-$as_echo_n "checking how to convert $build file names to $host format... " >&6; }
-if test "${lt_cv_to_host_file_cmd+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  case $host in
-  *-*-mingw* )
-    case $build in
-      *-*-mingw* ) # actually msys
-        lt_cv_to_host_file_cmd=func_convert_file_msys_to_w32
-        ;;
-      *-*-cygwin* )
-        lt_cv_to_host_file_cmd=func_convert_file_cygwin_to_w32
-        ;;
-      * ) # otherwise, assume *nix
-        lt_cv_to_host_file_cmd=func_convert_file_nix_to_w32
-        ;;
-    esac
-    ;;
-  *-*-cygwin* )
-    case $build in
-      *-*-mingw* ) # actually msys
-        lt_cv_to_host_file_cmd=func_convert_file_msys_to_cygwin
-        ;;
-      *-*-cygwin* )
-        lt_cv_to_host_file_cmd=func_convert_file_noop
-        ;;
-      * ) # otherwise, assume *nix
-        lt_cv_to_host_file_cmd=func_convert_file_nix_to_cygwin
-        ;;
-    esac
-    ;;
-  * ) # unhandled hosts (and "normal" native builds)
-    lt_cv_to_host_file_cmd=func_convert_file_noop
-    ;;
-esac
-
-fi
-
-to_host_file_cmd=$lt_cv_to_host_file_cmd
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_to_host_file_cmd" >&5
-$as_echo "$lt_cv_to_host_file_cmd" >&6; }
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking how to convert $build file names to toolchain format" >&5
-$as_echo_n "checking how to convert $build file names to toolchain format... " >&6; }
-if test "${lt_cv_to_tool_file_cmd+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  #assume ordinary cross tools, or native build.
-lt_cv_to_tool_file_cmd=func_convert_file_noop
-case $host in
-  *-*-mingw* )
-    case $build in
-      *-*-mingw* ) # actually msys
-        lt_cv_to_tool_file_cmd=func_convert_file_msys_to_w32
-        ;;
-    esac
-    ;;
-esac
-
-fi
-
-to_tool_file_cmd=$lt_cv_to_tool_file_cmd
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_to_tool_file_cmd" >&5
-$as_echo "$lt_cv_to_tool_file_cmd" >&6; }
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $LD option to reload object files" >&5
-$as_echo_n "checking for $LD option to reload object files... " >&6; }
-if test "${lt_cv_ld_reload_flag+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_ld_reload_flag='-r'
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_ld_reload_flag" >&5
-$as_echo "$lt_cv_ld_reload_flag" >&6; }
-reload_flag=$lt_cv_ld_reload_flag
-case $reload_flag in
-"" | " "*) ;;
-*) reload_flag=" $reload_flag" ;;
-esac
-reload_cmds='$LD$reload_flag -o $output$reload_objs'
-case $host_os in
-  cygwin* | mingw* | pw32* | cegcc*)
-    if test "$GCC" != yes; then
-      reload_cmds=false
-    fi
-    ;;
-  darwin*)
-    if test "$GCC" = yes; then
-      reload_cmds='$LTCC $LTCFLAGS -nostdlib ${wl}-r -o $output$reload_objs'
-    else
-      reload_cmds='$LD$reload_flag -o $output$reload_objs'
-    fi
-    ;;
-esac
-
-
-
-
-
-
-
-
-
-if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}objdump", so it can be a program name with args.
-set dummy ${ac_tool_prefix}objdump; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_OBJDUMP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$OBJDUMP"; then
-  ac_cv_prog_OBJDUMP="$OBJDUMP" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_OBJDUMP="${ac_tool_prefix}objdump"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-OBJDUMP=$ac_cv_prog_OBJDUMP
-if test -n "$OBJDUMP"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $OBJDUMP" >&5
-$as_echo "$OBJDUMP" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_OBJDUMP"; then
-  ac_ct_OBJDUMP=$OBJDUMP
-  # Extract the first word of "objdump", so it can be a program name with args.
-set dummy objdump; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_OBJDUMP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_OBJDUMP"; then
-  ac_cv_prog_ac_ct_OBJDUMP="$ac_ct_OBJDUMP" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_OBJDUMP="objdump"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_OBJDUMP=$ac_cv_prog_ac_ct_OBJDUMP
-if test -n "$ac_ct_OBJDUMP"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_OBJDUMP" >&5
-$as_echo "$ac_ct_OBJDUMP" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_OBJDUMP" = x; then
-    OBJDUMP="false"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    OBJDUMP=$ac_ct_OBJDUMP
-  fi
-else
-  OBJDUMP="$ac_cv_prog_OBJDUMP"
-fi
-
-test -z "$OBJDUMP" && OBJDUMP=objdump
-
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking how to recognize dependent libraries" >&5
-$as_echo_n "checking how to recognize dependent libraries... " >&6; }
-if test "${lt_cv_deplibs_check_method+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_file_magic_cmd='$MAGIC_CMD'
-lt_cv_file_magic_test_file=
-lt_cv_deplibs_check_method='unknown'
-# Need to set the preceding variable on all platforms that support
-# interlibrary dependencies.
-# 'none' -- dependencies not supported.
-# `unknown' -- same as none, but documents that we really don't know.
-# 'pass_all' -- all dependencies passed with no checks.
-# 'test_compile' -- check by making test program.
-# 'file_magic [[regex]]' -- check by looking for files in library path
-# which responds to the $file_magic_cmd with a given extended regex.
-# If you have `file' or equivalent on your system and you're not sure
-# whether `pass_all' will *always* work, you probably want this one.
-
-case $host_os in
-aix[4-9]*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-beos*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-bsdi[45]*)
-  lt_cv_deplibs_check_method='file_magic ELF [0-9][0-9]*-bit [ML]SB (shared object|dynamic lib)'
-  lt_cv_file_magic_cmd='/usr/bin/file -L'
-  lt_cv_file_magic_test_file=/shlib/libc.so
-  ;;
-
-cygwin*)
-  # func_win32_libid is a shell function defined in ltmain.sh
-  lt_cv_deplibs_check_method='file_magic ^x86 archive import|^x86 DLL'
-  lt_cv_file_magic_cmd='func_win32_libid'
-  ;;
-
-mingw* | pw32*)
-  # Base MSYS/MinGW do not provide the 'file' command needed by
-  # func_win32_libid shell function, so use a weaker test based on 'objdump',
-  # unless we find 'file', for example because we are cross-compiling.
-  # func_win32_libid assumes BSD nm, so disallow it if using MS dumpbin.
-  if ( test "$lt_cv_nm_interface" = "BSD nm" && file / ) >/dev/null 2>&1; then
-    lt_cv_deplibs_check_method='file_magic ^x86 archive import|^x86 DLL'
-    lt_cv_file_magic_cmd='func_win32_libid'
-  else
-    # Keep this pattern in sync with the one in func_win32_libid.
-    lt_cv_deplibs_check_method='file_magic file format (pei*-i386(.*architecture: i386)?|pe-arm-wince|pe-x86-64)'
-    lt_cv_file_magic_cmd='$OBJDUMP -f'
-  fi
-  ;;
-
-cegcc*)
-  # use the weaker test based on 'objdump'. See mingw*.
-  lt_cv_deplibs_check_method='file_magic file format pe-arm-.*little(.*architecture: arm)?'
-  lt_cv_file_magic_cmd='$OBJDUMP -f'
-  ;;
-
-darwin* | rhapsody*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-freebsd* | dragonfly*)
-  if echo __ELF__ | $CC -E - | $GREP __ELF__ > /dev/null; then
-    case $host_cpu in
-    i*86 )
-      # Not sure whether the presence of OpenBSD here was a mistake.
-      # Let's accept both of them until this is cleared up.
-      lt_cv_deplibs_check_method='file_magic (FreeBSD|OpenBSD|DragonFly)/i[3-9]86 (compact )?demand paged shared library'
-      lt_cv_file_magic_cmd=/usr/bin/file
-      lt_cv_file_magic_test_file=`echo /usr/lib/libc.so.*`
-      ;;
-    esac
-  else
-    lt_cv_deplibs_check_method=pass_all
-  fi
-  ;;
-
-gnu*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-haiku*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-hpux10.20* | hpux11*)
-  lt_cv_file_magic_cmd=/usr/bin/file
-  case $host_cpu in
-  ia64*)
-    lt_cv_deplibs_check_method='file_magic (s[0-9][0-9][0-9]|ELF-[0-9][0-9]) shared object file - IA64'
-    lt_cv_file_magic_test_file=/usr/lib/hpux32/libc.so
-    ;;
-  hppa*64*)
-    lt_cv_deplibs_check_method='file_magic (s[0-9][0-9][0-9]|ELF[ -][0-9][0-9])(-bit)?( [LM]SB)? shared object( file)?[, -]* PA-RISC [0-9]\.[0-9]'
-    lt_cv_file_magic_test_file=/usr/lib/pa20_64/libc.sl
-    ;;
-  *)
-    lt_cv_deplibs_check_method='file_magic (s[0-9][0-9][0-9]|PA-RISC[0-9]\.[0-9]) shared library'
-    lt_cv_file_magic_test_file=/usr/lib/libc.sl
-    ;;
-  esac
-  ;;
-
-interix[3-9]*)
-  # PIC code is broken on Interix 3.x, that's why |\.a not |_pic\.a here
-  lt_cv_deplibs_check_method='match_pattern /lib[^/]+(\.so|\.a)$'
-  ;;
-
-irix5* | irix6* | nonstopux*)
-  case $LD in
-  *-32|*"-32 ") libmagic=32-bit;;
-  *-n32|*"-n32 ") libmagic=N32;;
-  *-64|*"-64 ") libmagic=64-bit;;
-  *) libmagic=never-match;;
-  esac
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-# This must be glibc/ELF.
-linux* | k*bsd*-gnu | kopensolaris*-gnu)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-netbsd*)
-  if echo __ELF__ | $CC -E - | $GREP __ELF__ > /dev/null; then
-    lt_cv_deplibs_check_method='match_pattern /lib[^/]+(\.so\.[0-9]+\.[0-9]+|_pic\.a)$'
-  else
-    lt_cv_deplibs_check_method='match_pattern /lib[^/]+(\.so|_pic\.a)$'
-  fi
-  ;;
-
-newos6*)
-  lt_cv_deplibs_check_method='file_magic ELF [0-9][0-9]*-bit [ML]SB (executable|dynamic lib)'
-  lt_cv_file_magic_cmd=/usr/bin/file
-  lt_cv_file_magic_test_file=/usr/lib/libnls.so
-  ;;
-
-*nto* | *qnx*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-openbsd*)
-  if test -z "`echo __ELF__ | $CC -E - | $GREP __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-    lt_cv_deplibs_check_method='match_pattern /lib[^/]+(\.so\.[0-9]+\.[0-9]+|\.so|_pic\.a)$'
-  else
-    lt_cv_deplibs_check_method='match_pattern /lib[^/]+(\.so\.[0-9]+\.[0-9]+|_pic\.a)$'
-  fi
-  ;;
-
-osf3* | osf4* | osf5*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-rdos*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-solaris*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-sysv5* | sco3.2v5* | sco5v6* | unixware* | OpenUNIX* | sysv4*uw2*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-sysv4 | sysv4.3*)
-  case $host_vendor in
-  motorola)
-    lt_cv_deplibs_check_method='file_magic ELF [0-9][0-9]*-bit [ML]SB (shared object|dynamic lib) M[0-9][0-9]* Version [0-9]'
-    lt_cv_file_magic_test_file=`echo /usr/lib/libc.so*`
-    ;;
-  ncr)
-    lt_cv_deplibs_check_method=pass_all
-    ;;
-  sequent)
-    lt_cv_file_magic_cmd='/bin/file'
-    lt_cv_deplibs_check_method='file_magic ELF [0-9][0-9]*-bit [LM]SB (shared object|dynamic lib )'
-    ;;
-  sni)
-    lt_cv_file_magic_cmd='/bin/file'
-    lt_cv_deplibs_check_method="file_magic ELF [0-9][0-9]*-bit [LM]SB dynamic lib"
-    lt_cv_file_magic_test_file=/lib/libc.so
-    ;;
-  siemens)
-    lt_cv_deplibs_check_method=pass_all
-    ;;
-  pc)
-    lt_cv_deplibs_check_method=pass_all
-    ;;
-  esac
-  ;;
-
-tpf*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-esac
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_deplibs_check_method" >&5
-$as_echo "$lt_cv_deplibs_check_method" >&6; }
-
-file_magic_glob=
-want_nocaseglob=no
-if test "$build" = "$host"; then
-  case $host_os in
-  mingw* | pw32*)
-    if ( shopt | grep nocaseglob ) >/dev/null 2>&1; then
-      want_nocaseglob=yes
-    else
-      file_magic_glob=`echo aAbBcCdDeEfFgGhHiIjJkKlLmMnNoOpPqQrRsStTuUvVwWxXyYzZ | $SED -e "s/\(..\)/s\/[\1]\/[\1]\/g;/g"`
-    fi
-    ;;
-  esac
-fi
-
-file_magic_cmd=$lt_cv_file_magic_cmd
-deplibs_check_method=$lt_cv_deplibs_check_method
-test -z "$deplibs_check_method" && deplibs_check_method=unknown
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}dlltool", so it can be a program name with args.
-set dummy ${ac_tool_prefix}dlltool; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_DLLTOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$DLLTOOL"; then
-  ac_cv_prog_DLLTOOL="$DLLTOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_DLLTOOL="${ac_tool_prefix}dlltool"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-DLLTOOL=$ac_cv_prog_DLLTOOL
-if test -n "$DLLTOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $DLLTOOL" >&5
-$as_echo "$DLLTOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_DLLTOOL"; then
-  ac_ct_DLLTOOL=$DLLTOOL
-  # Extract the first word of "dlltool", so it can be a program name with args.
-set dummy dlltool; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_DLLTOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_DLLTOOL"; then
-  ac_cv_prog_ac_ct_DLLTOOL="$ac_ct_DLLTOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_DLLTOOL="dlltool"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_DLLTOOL=$ac_cv_prog_ac_ct_DLLTOOL
-if test -n "$ac_ct_DLLTOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_DLLTOOL" >&5
-$as_echo "$ac_ct_DLLTOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_DLLTOOL" = x; then
-    DLLTOOL="false"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    DLLTOOL=$ac_ct_DLLTOOL
-  fi
-else
-  DLLTOOL="$ac_cv_prog_DLLTOOL"
-fi
-
-test -z "$DLLTOOL" && DLLTOOL=dlltool
-
-
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking how to associate runtime and link libraries" >&5
-$as_echo_n "checking how to associate runtime and link libraries... " >&6; }
-if test "${lt_cv_sharedlib_from_linklib_cmd+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_sharedlib_from_linklib_cmd='unknown'
-
-case $host_os in
-cygwin* | mingw* | pw32* | cegcc*)
-  # two different shell functions defined in ltmain.sh
-  # decide which to use based on capabilities of $DLLTOOL
-  case `$DLLTOOL --help 2>&1` in
-  *--identify-strict*)
-    lt_cv_sharedlib_from_linklib_cmd=func_cygming_dll_for_implib
-    ;;
-  *)
-    lt_cv_sharedlib_from_linklib_cmd=func_cygming_dll_for_implib_fallback
-    ;;
-  esac
-  ;;
-*)
-  # fallback: assume linklib IS sharedlib
-  lt_cv_sharedlib_from_linklib_cmd="$ECHO"
-  ;;
-esac
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_sharedlib_from_linklib_cmd" >&5
-$as_echo "$lt_cv_sharedlib_from_linklib_cmd" >&6; }
-sharedlib_from_linklib_cmd=$lt_cv_sharedlib_from_linklib_cmd
-test -z "$sharedlib_from_linklib_cmd" && sharedlib_from_linklib_cmd=$ECHO
-
-
-
-
-
-
-
-
-if test -n "$ac_tool_prefix"; then
-  for ac_prog in ar
-  do
-    # Extract the first word of "$ac_tool_prefix$ac_prog", so it can be a program name with args.
-set dummy $ac_tool_prefix$ac_prog; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_AR+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$AR"; then
-  ac_cv_prog_AR="$AR" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_AR="$ac_tool_prefix$ac_prog"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-AR=$ac_cv_prog_AR
-if test -n "$AR"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $AR" >&5
-$as_echo "$AR" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-    test -n "$AR" && break
-  done
-fi
-if test -z "$AR"; then
-  ac_ct_AR=$AR
-  for ac_prog in ar
-do
-  # Extract the first word of "$ac_prog", so it can be a program name with args.
-set dummy $ac_prog; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_AR+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_AR"; then
-  ac_cv_prog_ac_ct_AR="$ac_ct_AR" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_AR="$ac_prog"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_AR=$ac_cv_prog_ac_ct_AR
-if test -n "$ac_ct_AR"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_AR" >&5
-$as_echo "$ac_ct_AR" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-  test -n "$ac_ct_AR" && break
-done
-
-  if test "x$ac_ct_AR" = x; then
-    AR="false"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    AR=$ac_ct_AR
-  fi
-fi
-
-: ${AR=ar}
-: ${AR_FLAGS=cru}
-
-
-
-
-
-
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for archiver @FILE support" >&5
-$as_echo_n "checking for archiver @FILE support... " >&6; }
-if test "${lt_cv_ar_at_file+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_ar_at_file=no
-   cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_compile "$LINENO"; then :
-  echo conftest.$ac_objext > conftest.lst
-      lt_ar_try='$AR $AR_FLAGS libconftest.a @conftest.lst >&5'
-      { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$lt_ar_try\""; } >&5
-  (eval $lt_ar_try) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }
-      if test "$ac_status" -eq 0; then
-	# Ensure the archiver fails upon bogus file names.
-	rm -f conftest.$ac_objext libconftest.a
-	{ { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$lt_ar_try\""; } >&5
-  (eval $lt_ar_try) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }
-	if test "$ac_status" -ne 0; then
-          lt_cv_ar_at_file=@
-        fi
-      fi
-      rm -f conftest.* libconftest.a
-
-fi
-rm -f core conftest.err conftest.$ac_objext conftest.$ac_ext
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_ar_at_file" >&5
-$as_echo "$lt_cv_ar_at_file" >&6; }
-
-if test "x$lt_cv_ar_at_file" = xno; then
-  archiver_list_spec=
-else
-  archiver_list_spec=$lt_cv_ar_at_file
-fi
-
-
-
-
-
-
-
-if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}strip", so it can be a program name with args.
-set dummy ${ac_tool_prefix}strip; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_STRIP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$STRIP"; then
-  ac_cv_prog_STRIP="$STRIP" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_STRIP="${ac_tool_prefix}strip"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-STRIP=$ac_cv_prog_STRIP
-if test -n "$STRIP"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $STRIP" >&5
-$as_echo "$STRIP" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_STRIP"; then
-  ac_ct_STRIP=$STRIP
-  # Extract the first word of "strip", so it can be a program name with args.
-set dummy strip; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_STRIP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_STRIP"; then
-  ac_cv_prog_ac_ct_STRIP="$ac_ct_STRIP" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_STRIP="strip"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_STRIP=$ac_cv_prog_ac_ct_STRIP
-if test -n "$ac_ct_STRIP"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_STRIP" >&5
-$as_echo "$ac_ct_STRIP" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_STRIP" = x; then
-    STRIP=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    STRIP=$ac_ct_STRIP
-  fi
-else
-  STRIP="$ac_cv_prog_STRIP"
-fi
-
-test -z "$STRIP" && STRIP=:
-
-
-
-
-
-
-if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}ranlib", so it can be a program name with args.
-set dummy ${ac_tool_prefix}ranlib; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_RANLIB+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$RANLIB"; then
-  ac_cv_prog_RANLIB="$RANLIB" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_RANLIB="${ac_tool_prefix}ranlib"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-RANLIB=$ac_cv_prog_RANLIB
-if test -n "$RANLIB"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $RANLIB" >&5
-$as_echo "$RANLIB" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_RANLIB"; then
-  ac_ct_RANLIB=$RANLIB
-  # Extract the first word of "ranlib", so it can be a program name with args.
-set dummy ranlib; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_RANLIB+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_RANLIB"; then
-  ac_cv_prog_ac_ct_RANLIB="$ac_ct_RANLIB" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_RANLIB="ranlib"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_RANLIB=$ac_cv_prog_ac_ct_RANLIB
-if test -n "$ac_ct_RANLIB"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_RANLIB" >&5
-$as_echo "$ac_ct_RANLIB" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_RANLIB" = x; then
-    RANLIB=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    RANLIB=$ac_ct_RANLIB
-  fi
-else
-  RANLIB="$ac_cv_prog_RANLIB"
-fi
-
-test -z "$RANLIB" && RANLIB=:
-
-
-
-
-
-
-# Determine commands to create old-style static archives.
-old_archive_cmds='$AR $AR_FLAGS $oldlib$oldobjs'
-old_postinstall_cmds='chmod 644 $oldlib'
-old_postuninstall_cmds=
-
-if test -n "$RANLIB"; then
-  case $host_os in
-  openbsd*)
-    old_postinstall_cmds="$old_postinstall_cmds~\$RANLIB -t \$tool_oldlib"
-    ;;
-  *)
-    old_postinstall_cmds="$old_postinstall_cmds~\$RANLIB \$tool_oldlib"
-    ;;
-  esac
-  old_archive_cmds="$old_archive_cmds~\$RANLIB \$tool_oldlib"
-fi
-
-case $host_os in
-  darwin*)
-    lock_old_archive_extraction=yes ;;
-  *)
-    lock_old_archive_extraction=no ;;
-esac
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-# If no C compiler was specified, use CC.
-LTCC=${LTCC-"$CC"}
-
-# If no C compiler flags were specified, use CFLAGS.
-LTCFLAGS=${LTCFLAGS-"$CFLAGS"}
-
-# Allow CC to be a program name with arguments.
-compiler=$CC
-
-
-# Check for command to grab the raw symbol name followed by C symbol from nm.
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking command to parse $NM output from $compiler object" >&5
-$as_echo_n "checking command to parse $NM output from $compiler object... " >&6; }
-if test "${lt_cv_sys_global_symbol_pipe+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-
-# These are sane defaults that work on at least a few old systems.
-# [They come from Ultrix.  What could be older than Ultrix?!! ;)]
-
-# Character class describing NM global symbol codes.
-symcode='[BCDEGRST]'
-
-# Regexp to match symbols that can be accessed directly from C.
-sympat='\([_A-Za-z][_A-Za-z0-9]*\)'
-
-# Define system-specific variables.
-case $host_os in
-aix*)
-  symcode='[BCDT]'
-  ;;
-cygwin* | mingw* | pw32* | cegcc*)
-  symcode='[ABCDGISTW]'
-  ;;
-hpux*)
-  if test "$host_cpu" = ia64; then
-    symcode='[ABCDEGRST]'
-  fi
-  ;;
-irix* | nonstopux*)
-  symcode='[BCDEGRST]'
-  ;;
-osf*)
-  symcode='[BCDEGQRST]'
-  ;;
-solaris*)
-  symcode='[BDRT]'
-  ;;
-sco3.2v5*)
-  symcode='[DT]'
-  ;;
-sysv4.2uw2*)
-  symcode='[DT]'
-  ;;
-sysv5* | sco5v6* | unixware* | OpenUNIX*)
-  symcode='[ABDT]'
-  ;;
-sysv4)
-  symcode='[DFNSTU]'
-  ;;
-esac
-
-# If we're using GNU nm, then use its standard symbol codes.
-case `$NM -V 2>&1` in
-*GNU* | *'with BFD'*)
-  symcode='[ABCDGIRSTW]' ;;
-esac
-
-# Transform an extracted symbol line into a proper C declaration.
-# Some systems (esp. on ia64) link data and code symbols differently,
-# so use this general approach.
-lt_cv_sys_global_symbol_to_cdecl="sed -n -e 's/^T .* \(.*\)$/extern int \1();/p' -e 's/^$symcode* .* \(.*\)$/extern char \1;/p'"
-
-# Transform an extracted symbol line into symbol name and symbol address
-lt_cv_sys_global_symbol_to_c_name_address="sed -n -e 's/^: \([^ ]*\)[ ]*$/  {\\\"\1\\\", (void *) 0},/p' -e 's/^$symcode* \([^ ]*\) \([^ ]*\)$/  {\"\2\", (void *) \&\2},/p'"
-lt_cv_sys_global_symbol_to_c_name_address_lib_prefix="sed -n -e 's/^: \([^ ]*\)[ ]*$/  {\\\"\1\\\", (void *) 0},/p' -e 's/^$symcode* \([^ ]*\) \(lib[^ ]*\)$/  {\"\2\", (void *) \&\2},/p' -e 's/^$symcode* \([^ ]*\) \([^ ]*\)$/  {\"lib\2\", (void *) \&\2},/p'"
-
-# Handle CRLF in mingw tool chain
-opt_cr=
-case $build_os in
-mingw*)
-  opt_cr=`$ECHO 'x\{0,1\}' | tr x '\015'` # option cr in regexp
-  ;;
-esac
-
-# Try without a prefix underscore, then with it.
-for ac_symprfx in "" "_"; do
-
-  # Transform symcode, sympat, and symprfx into a raw symbol and a C symbol.
-  symxfrm="\\1 $ac_symprfx\\2 \\2"
-
-  # Write the raw and C identifiers.
-  if test "$lt_cv_nm_interface" = "MS dumpbin"; then
-    # Fake it for dumpbin and say T for any non-static function
-    # and D for any global variable.
-    # Also find C++ and __fastcall symbols from MSVC++,
-    # which start with @ or ?.
-    lt_cv_sys_global_symbol_pipe="$AWK '"\
-"     {last_section=section; section=\$ 3};"\
-"     /^COFF SYMBOL TABLE/{for(i in hide) delete hide[i]};"\
-"     /Section length .*#relocs.*(pick any)/{hide[last_section]=1};"\
-"     \$ 0!~/External *\|/{next};"\
-"     / 0+ UNDEF /{next}; / UNDEF \([^|]\)*()/{next};"\
-"     {if(hide[section]) next};"\
-"     {f=0}; \$ 0~/\(\).*\|/{f=1}; {printf f ? \"T \" : \"D \"};"\
-"     {split(\$ 0, a, /\||\r/); split(a[2], s)};"\
-"     s[1]~/^[@?]/{print s[1], s[1]; next};"\
-"     s[1]~prfx {split(s[1],t,\"@\"); print t[1], substr(t[1],length(prfx))}"\
-"     ' prfx=^$ac_symprfx"
-  else
-    lt_cv_sys_global_symbol_pipe="sed -n -e 's/^.*[	 ]\($symcode$symcode*\)[	 ][	 ]*$ac_symprfx$sympat$opt_cr$/$symxfrm/p'"
-  fi
-  lt_cv_sys_global_symbol_pipe="$lt_cv_sys_global_symbol_pipe | sed '/ __gnu_lto/d'"
-
-  # Check to see that the pipe works correctly.
-  pipe_works=no
-
-  rm -f conftest*
-  cat > conftest.$ac_ext <<_LT_EOF
-#ifdef __cplusplus
-extern "C" {
-#endif
-char nm_test_var;
-void nm_test_func(void);
-void nm_test_func(void){}
-#ifdef __cplusplus
-}
-#endif
-int main(){nm_test_var='a';nm_test_func();return(0);}
-_LT_EOF
-
-  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }; then
-    # Now try to grab the symbols.
-    nlist=conftest.nm
-    if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$NM conftest.$ac_objext \| "$lt_cv_sys_global_symbol_pipe" \> $nlist\""; } >&5
-  (eval $NM conftest.$ac_objext \| "$lt_cv_sys_global_symbol_pipe" \> $nlist) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; } && test -s "$nlist"; then
-      # Try sorting and uniquifying the output.
-      if sort "$nlist" | uniq > "$nlist"T; then
-	mv -f "$nlist"T "$nlist"
-      else
-	rm -f "$nlist"T
-      fi
-
-      # Make sure that we snagged all the symbols we need.
-      if $GREP ' nm_test_var$' "$nlist" >/dev/null; then
-	if $GREP ' nm_test_func$' "$nlist" >/dev/null; then
-	  cat <<_LT_EOF > conftest.$ac_ext
-/* Keep this code in sync between libtool.m4, ltmain, lt_system.h, and tests.  */
-#if defined(_WIN32) || defined(__CYGWIN__) || defined(_WIN32_WCE)
-/* DATA imports from DLLs on WIN32 con't be const, because runtime
-   relocations are performed -- see ld's documentation on pseudo-relocs.  */
-# define LT_DLSYM_CONST
-#elif defined(__osf__)
-/* This system does not cope well with relocations in const data.  */
-# define LT_DLSYM_CONST
-#else
-# define LT_DLSYM_CONST const
-#endif
-
-#ifdef __cplusplus
-extern "C" {
-#endif
-
-_LT_EOF
-	  # Now generate the symbol file.
-	  eval "$lt_cv_sys_global_symbol_to_cdecl"' < "$nlist" | $GREP -v main >> conftest.$ac_ext'
-
-	  cat <<_LT_EOF >> conftest.$ac_ext
-
-/* The mapping between symbol names and symbols.  */
-LT_DLSYM_CONST struct {
-  const char *name;
-  void       *address;
-}
-lt__PROGRAM__LTX_preloaded_symbols[] =
-{
-  { "@PROGRAM@", (void *) 0 },
-_LT_EOF
-	  $SED "s/^$symcode$symcode* \(.*\) \(.*\)$/  {\"\2\", (void *) \&\2},/" < "$nlist" | $GREP -v main >> conftest.$ac_ext
-	  cat <<\_LT_EOF >> conftest.$ac_ext
-  {0, (void *) 0}
-};
-
-/* This works around a problem in FreeBSD linker */
-#ifdef FREEBSD_WORKAROUND
-static const void *lt_preloaded_setup() {
-  return lt__PROGRAM__LTX_preloaded_symbols;
-}
-#endif
-
-#ifdef __cplusplus
-}
-#endif
-_LT_EOF
-	  # Now try linking the two files.
-	  mv conftest.$ac_objext conftstm.$ac_objext
-	  lt_globsym_save_LIBS=$LIBS
-	  lt_globsym_save_CFLAGS=$CFLAGS
-	  LIBS="conftstm.$ac_objext"
-	  CFLAGS="$CFLAGS$lt_prog_compiler_no_builtin_flag"
-	  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_link\""; } >&5
-  (eval $ac_link) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; } && test -s conftest${ac_exeext}; then
-	    pipe_works=yes
-	  fi
-	  LIBS=$lt_globsym_save_LIBS
-	  CFLAGS=$lt_globsym_save_CFLAGS
-	else
-	  echo "cannot find nm_test_func in $nlist" >&5
-	fi
-      else
-	echo "cannot find nm_test_var in $nlist" >&5
-      fi
-    else
-      echo "cannot run $lt_cv_sys_global_symbol_pipe" >&5
-    fi
-  else
-    echo "$progname: failed program was:" >&5
-    cat conftest.$ac_ext >&5
-  fi
-  rm -rf conftest* conftst*
-
-  # Do not use the global_symbol_pipe unless it works.
-  if test "$pipe_works" = yes; then
-    break
-  else
-    lt_cv_sys_global_symbol_pipe=
-  fi
-done
-
-fi
-
-if test -z "$lt_cv_sys_global_symbol_pipe"; then
-  lt_cv_sys_global_symbol_to_cdecl=
-fi
-if test -z "$lt_cv_sys_global_symbol_pipe$lt_cv_sys_global_symbol_to_cdecl"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: failed" >&5
-$as_echo "failed" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: ok" >&5
-$as_echo "ok" >&6; }
-fi
-
-# Response file support.
-if test "$lt_cv_nm_interface" = "MS dumpbin"; then
-  nm_file_list_spec='@'
-elif $NM --help 2>/dev/null | grep '[@]FILE' >/dev/null; then
-  nm_file_list_spec='@'
-fi
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for sysroot" >&5
-$as_echo_n "checking for sysroot... " >&6; }
-
-# Check whether --with-sysroot was given.
-if test "${with_sysroot+set}" = set; then :
-  withval=$with_sysroot;
-else
-  with_sysroot=no
-fi
-
-
-lt_sysroot=
-case ${with_sysroot} in #(
- yes)
-   if test "$GCC" = yes; then
-     lt_sysroot=`$CC --print-sysroot 2>/dev/null`
-   fi
-   ;; #(
- /*)
-   lt_sysroot=`echo "$with_sysroot" | sed -e "$sed_quote_subst"`
-   ;; #(
- no|'')
-   ;; #(
- *)
-   { $as_echo "$as_me:${as_lineno-$LINENO}: result: ${with_sysroot}" >&5
-$as_echo "${with_sysroot}" >&6; }
-   as_fn_error $? "The sysroot must be an absolute path." "$LINENO" 5
-   ;;
-esac
-
- { $as_echo "$as_me:${as_lineno-$LINENO}: result: ${lt_sysroot:-no}" >&5
-$as_echo "${lt_sysroot:-no}" >&6; }
-
-
-
-
-
-# Check whether --enable-libtool-lock was given.
-if test "${enable_libtool_lock+set}" = set; then :
-  enableval=$enable_libtool_lock;
-fi
-
-test "x$enable_libtool_lock" != xno && enable_libtool_lock=yes
-
-# Some flags need to be propagated to the compiler or linker for good
-# libtool support.
-case $host in
-ia64-*-hpux*)
-  # Find out which ABI we are using.
-  echo 'int i;' > conftest.$ac_ext
-  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }; then
-    case `/usr/bin/file conftest.$ac_objext` in
-      *ELF-32*)
-	HPUX_IA64_MODE="32"
-	;;
-      *ELF-64*)
-	HPUX_IA64_MODE="64"
-	;;
-    esac
-  fi
-  rm -rf conftest*
-  ;;
-*-*-irix6*)
-  # Find out which ABI we are using.
-  echo '#line '$LINENO' "configure"' > conftest.$ac_ext
-  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }; then
-    if test "$lt_cv_prog_gnu_ld" = yes; then
-      case `/usr/bin/file conftest.$ac_objext` in
-	*32-bit*)
-	  LD="${LD-ld} -melf32bsmip"
-	  ;;
-	*N32*)
-	  LD="${LD-ld} -melf32bmipn32"
-	  ;;
-	*64-bit*)
-	  LD="${LD-ld} -melf64bmip"
-	;;
-      esac
-    else
-      case `/usr/bin/file conftest.$ac_objext` in
-	*32-bit*)
-	  LD="${LD-ld} -32"
-	  ;;
-	*N32*)
-	  LD="${LD-ld} -n32"
-	  ;;
-	*64-bit*)
-	  LD="${LD-ld} -64"
-	  ;;
-      esac
-    fi
-  fi
-  rm -rf conftest*
-  ;;
-
-x86_64-*kfreebsd*-gnu|x86_64-*linux*|ppc*-*linux*|powerpc*-*linux*| \
-s390*-*linux*|s390*-*tpf*|sparc*-*linux*)
-  # Find out which ABI we are using.
-  echo 'int i;' > conftest.$ac_ext
-  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }; then
-    case `/usr/bin/file conftest.o` in
-      *32-bit*)
-	case $host in
-	  x86_64-*kfreebsd*-gnu)
-	    LD="${LD-ld} -m elf_i386_fbsd"
-	    ;;
-	  x86_64-*linux*)
-	    LD="${LD-ld} -m elf_i386"
-	    ;;
-	  ppc64-*linux*|powerpc64-*linux*)
-	    LD="${LD-ld} -m elf32ppclinux"
-	    ;;
-	  s390x-*linux*)
-	    LD="${LD-ld} -m elf_s390"
-	    ;;
-	  sparc64-*linux*)
-	    LD="${LD-ld} -m elf32_sparc"
-	    ;;
-	esac
-	;;
-      *64-bit*)
-	case $host in
-	  x86_64-*kfreebsd*-gnu)
-	    LD="${LD-ld} -m elf_x86_64_fbsd"
-	    ;;
-	  x86_64-*linux*)
-	    LD="${LD-ld} -m elf_x86_64"
-	    ;;
-	  ppc*-*linux*|powerpc*-*linux*)
-	    LD="${LD-ld} -m elf64ppc"
-	    ;;
-	  s390*-*linux*|s390*-*tpf*)
-	    LD="${LD-ld} -m elf64_s390"
-	    ;;
-	  sparc*-*linux*)
-	    LD="${LD-ld} -m elf64_sparc"
-	    ;;
-	esac
-	;;
-    esac
-  fi
-  rm -rf conftest*
-  ;;
-
-*-*-sco3.2v5*)
-  # On SCO OpenServer 5, we need -belf to get full-featured binaries.
-  SAVE_CFLAGS="$CFLAGS"
-  CFLAGS="$CFLAGS -belf"
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether the C compiler needs -belf" >&5
-$as_echo_n "checking whether the C compiler needs -belf... " >&6; }
-if test "${lt_cv_cc_needs_belf+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-
-     cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  lt_cv_cc_needs_belf=yes
-else
-  lt_cv_cc_needs_belf=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-     ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_cc_needs_belf" >&5
-$as_echo "$lt_cv_cc_needs_belf" >&6; }
-  if test x"$lt_cv_cc_needs_belf" != x"yes"; then
-    # this is probably gcc 2.8.0, egcs 1.0 or newer; no need for -belf
-    CFLAGS="$SAVE_CFLAGS"
-  fi
-  ;;
-*-*solaris*)
-  # Find out which ABI we are using.
-  echo 'int i;' > conftest.$ac_ext
-  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }; then
-    case `/usr/bin/file conftest.o` in
-    *64-bit*)
-      case $lt_cv_prog_gnu_ld in
-      yes*)
-        case $host in
-        i?86-*-solaris*)
-          LD="${LD-ld} -m elf_x86_64"
-          ;;
-        sparc*-*-solaris*)
-          LD="${LD-ld} -m elf64_sparc"
-          ;;
-        esac
-        # GNU ld 2.21 introduced _sol2 emulations.  Use them if available.
-        if ${LD-ld} -V | grep _sol2 >/dev/null 2>&1; then
-          LD="${LD-ld}_sol2"
-        fi
-        ;;
-      *)
-	if ${LD-ld} -64 -r -o conftest2.o conftest.o >/dev/null 2>&1; then
-	  LD="${LD-ld} -64"
-	fi
-	;;
-      esac
-      ;;
-    esac
-  fi
-  rm -rf conftest*
-  ;;
-esac
-
-need_locks="$enable_libtool_lock"
-
-if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}mt", so it can be a program name with args.
-set dummy ${ac_tool_prefix}mt; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_MANIFEST_TOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$MANIFEST_TOOL"; then
-  ac_cv_prog_MANIFEST_TOOL="$MANIFEST_TOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_MANIFEST_TOOL="${ac_tool_prefix}mt"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-MANIFEST_TOOL=$ac_cv_prog_MANIFEST_TOOL
-if test -n "$MANIFEST_TOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $MANIFEST_TOOL" >&5
-$as_echo "$MANIFEST_TOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_MANIFEST_TOOL"; then
-  ac_ct_MANIFEST_TOOL=$MANIFEST_TOOL
-  # Extract the first word of "mt", so it can be a program name with args.
-set dummy mt; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_MANIFEST_TOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_MANIFEST_TOOL"; then
-  ac_cv_prog_ac_ct_MANIFEST_TOOL="$ac_ct_MANIFEST_TOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_MANIFEST_TOOL="mt"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_MANIFEST_TOOL=$ac_cv_prog_ac_ct_MANIFEST_TOOL
-if test -n "$ac_ct_MANIFEST_TOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_MANIFEST_TOOL" >&5
-$as_echo "$ac_ct_MANIFEST_TOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_MANIFEST_TOOL" = x; then
-    MANIFEST_TOOL=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    MANIFEST_TOOL=$ac_ct_MANIFEST_TOOL
-  fi
-else
-  MANIFEST_TOOL="$ac_cv_prog_MANIFEST_TOOL"
-fi
-
-test -z "$MANIFEST_TOOL" && MANIFEST_TOOL=mt
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking if $MANIFEST_TOOL is a manifest tool" >&5
-$as_echo_n "checking if $MANIFEST_TOOL is a manifest tool... " >&6; }
-if test "${lt_cv_path_mainfest_tool+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_path_mainfest_tool=no
-  echo "$as_me:$LINENO: $MANIFEST_TOOL '-?'" >&5
-  $MANIFEST_TOOL '-?' 2>conftest.err > conftest.out
-  cat conftest.err >&5
-  if $GREP 'Manifest Tool' conftest.out > /dev/null; then
-    lt_cv_path_mainfest_tool=yes
-  fi
-  rm -f conftest*
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_path_mainfest_tool" >&5
-$as_echo "$lt_cv_path_mainfest_tool" >&6; }
-if test "x$lt_cv_path_mainfest_tool" != xyes; then
-  MANIFEST_TOOL=:
-fi
-
-
-
-
-
-
-  case $host_os in
-    rhapsody* | darwin*)
-    if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}dsymutil", so it can be a program name with args.
-set dummy ${ac_tool_prefix}dsymutil; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_DSYMUTIL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$DSYMUTIL"; then
-  ac_cv_prog_DSYMUTIL="$DSYMUTIL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_DSYMUTIL="${ac_tool_prefix}dsymutil"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-DSYMUTIL=$ac_cv_prog_DSYMUTIL
-if test -n "$DSYMUTIL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $DSYMUTIL" >&5
-$as_echo "$DSYMUTIL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_DSYMUTIL"; then
-  ac_ct_DSYMUTIL=$DSYMUTIL
-  # Extract the first word of "dsymutil", so it can be a program name with args.
-set dummy dsymutil; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_DSYMUTIL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_DSYMUTIL"; then
-  ac_cv_prog_ac_ct_DSYMUTIL="$ac_ct_DSYMUTIL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_DSYMUTIL="dsymutil"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_DSYMUTIL=$ac_cv_prog_ac_ct_DSYMUTIL
-if test -n "$ac_ct_DSYMUTIL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_DSYMUTIL" >&5
-$as_echo "$ac_ct_DSYMUTIL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_DSYMUTIL" = x; then
-    DSYMUTIL=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    DSYMUTIL=$ac_ct_DSYMUTIL
-  fi
-else
-  DSYMUTIL="$ac_cv_prog_DSYMUTIL"
-fi
-
-    if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}nmedit", so it can be a program name with args.
-set dummy ${ac_tool_prefix}nmedit; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_NMEDIT+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$NMEDIT"; then
-  ac_cv_prog_NMEDIT="$NMEDIT" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_NMEDIT="${ac_tool_prefix}nmedit"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-NMEDIT=$ac_cv_prog_NMEDIT
-if test -n "$NMEDIT"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $NMEDIT" >&5
-$as_echo "$NMEDIT" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_NMEDIT"; then
-  ac_ct_NMEDIT=$NMEDIT
-  # Extract the first word of "nmedit", so it can be a program name with args.
-set dummy nmedit; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_NMEDIT+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_NMEDIT"; then
-  ac_cv_prog_ac_ct_NMEDIT="$ac_ct_NMEDIT" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_NMEDIT="nmedit"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_NMEDIT=$ac_cv_prog_ac_ct_NMEDIT
-if test -n "$ac_ct_NMEDIT"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_NMEDIT" >&5
-$as_echo "$ac_ct_NMEDIT" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_NMEDIT" = x; then
-    NMEDIT=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    NMEDIT=$ac_ct_NMEDIT
-  fi
-else
-  NMEDIT="$ac_cv_prog_NMEDIT"
-fi
-
-    if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}lipo", so it can be a program name with args.
-set dummy ${ac_tool_prefix}lipo; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_LIPO+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$LIPO"; then
-  ac_cv_prog_LIPO="$LIPO" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_LIPO="${ac_tool_prefix}lipo"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-LIPO=$ac_cv_prog_LIPO
-if test -n "$LIPO"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $LIPO" >&5
-$as_echo "$LIPO" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_LIPO"; then
-  ac_ct_LIPO=$LIPO
-  # Extract the first word of "lipo", so it can be a program name with args.
-set dummy lipo; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_LIPO+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_LIPO"; then
-  ac_cv_prog_ac_ct_LIPO="$ac_ct_LIPO" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_LIPO="lipo"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_LIPO=$ac_cv_prog_ac_ct_LIPO
-if test -n "$ac_ct_LIPO"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_LIPO" >&5
-$as_echo "$ac_ct_LIPO" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_LIPO" = x; then
-    LIPO=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    LIPO=$ac_ct_LIPO
-  fi
-else
-  LIPO="$ac_cv_prog_LIPO"
-fi
-
-    if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}otool", so it can be a program name with args.
-set dummy ${ac_tool_prefix}otool; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_OTOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$OTOOL"; then
-  ac_cv_prog_OTOOL="$OTOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_OTOOL="${ac_tool_prefix}otool"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-OTOOL=$ac_cv_prog_OTOOL
-if test -n "$OTOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $OTOOL" >&5
-$as_echo "$OTOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_OTOOL"; then
-  ac_ct_OTOOL=$OTOOL
-  # Extract the first word of "otool", so it can be a program name with args.
-set dummy otool; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_OTOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_OTOOL"; then
-  ac_cv_prog_ac_ct_OTOOL="$ac_ct_OTOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_OTOOL="otool"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_OTOOL=$ac_cv_prog_ac_ct_OTOOL
-if test -n "$ac_ct_OTOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_OTOOL" >&5
-$as_echo "$ac_ct_OTOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_OTOOL" = x; then
-    OTOOL=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    OTOOL=$ac_ct_OTOOL
-  fi
-else
-  OTOOL="$ac_cv_prog_OTOOL"
-fi
-
-    if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}otool64", so it can be a program name with args.
-set dummy ${ac_tool_prefix}otool64; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_OTOOL64+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$OTOOL64"; then
-  ac_cv_prog_OTOOL64="$OTOOL64" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_OTOOL64="${ac_tool_prefix}otool64"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-OTOOL64=$ac_cv_prog_OTOOL64
-if test -n "$OTOOL64"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $OTOOL64" >&5
-$as_echo "$OTOOL64" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_OTOOL64"; then
-  ac_ct_OTOOL64=$OTOOL64
-  # Extract the first word of "otool64", so it can be a program name with args.
-set dummy otool64; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_OTOOL64+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_OTOOL64"; then
-  ac_cv_prog_ac_ct_OTOOL64="$ac_ct_OTOOL64" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_OTOOL64="otool64"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_OTOOL64=$ac_cv_prog_ac_ct_OTOOL64
-if test -n "$ac_ct_OTOOL64"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_OTOOL64" >&5
-$as_echo "$ac_ct_OTOOL64" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_OTOOL64" = x; then
-    OTOOL64=":"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    OTOOL64=$ac_ct_OTOOL64
-  fi
-else
-  OTOOL64="$ac_cv_prog_OTOOL64"
-fi
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking for -single_module linker flag" >&5
-$as_echo_n "checking for -single_module linker flag... " >&6; }
-if test "${lt_cv_apple_cc_single_mod+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_apple_cc_single_mod=no
-      if test -z "${LT_MULTI_MODULE}"; then
-	# By default we will add the -single_module flag. You can override
-	# by either setting the environment variable LT_MULTI_MODULE
-	# non-empty at configure time, or by adding -multi_module to the
-	# link flags.
-	rm -rf libconftest.dylib*
-	echo "int foo(void){return 1;}" > conftest.c
-	echo "$LTCC $LTCFLAGS $LDFLAGS -o libconftest.dylib \
--dynamiclib -Wl,-single_module conftest.c" >&5
-	$LTCC $LTCFLAGS $LDFLAGS -o libconftest.dylib \
-	  -dynamiclib -Wl,-single_module conftest.c 2>conftest.err
-        _lt_result=$?
-	# If there is a non-empty error log, and "single_module"
-	# appears in it, assume the flag caused a linker warning
-        if test -s conftest.err && $GREP single_module conftest.err; then
-	  cat conftest.err >&5
-	# Otherwise, if the output was created with a 0 exit code from
-	# the compiler, it worked.
-	elif test -f libconftest.dylib && test $_lt_result -eq 0; then
-	  lt_cv_apple_cc_single_mod=yes
-	else
-	  cat conftest.err >&5
-	fi
-	rm -rf libconftest.dylib*
-	rm -f conftest.*
-      fi
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_apple_cc_single_mod" >&5
-$as_echo "$lt_cv_apple_cc_single_mod" >&6; }
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking for -exported_symbols_list linker flag" >&5
-$as_echo_n "checking for -exported_symbols_list linker flag... " >&6; }
-if test "${lt_cv_ld_exported_symbols_list+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_ld_exported_symbols_list=no
-      save_LDFLAGS=$LDFLAGS
-      echo "_main" > conftest.sym
-      LDFLAGS="$LDFLAGS -Wl,-exported_symbols_list,conftest.sym"
-      cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  lt_cv_ld_exported_symbols_list=yes
-else
-  lt_cv_ld_exported_symbols_list=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-	LDFLAGS="$save_LDFLAGS"
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_ld_exported_symbols_list" >&5
-$as_echo "$lt_cv_ld_exported_symbols_list" >&6; }
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking for -force_load linker flag" >&5
-$as_echo_n "checking for -force_load linker flag... " >&6; }
-if test "${lt_cv_ld_force_load+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_ld_force_load=no
-      cat > conftest.c << _LT_EOF
-int forced_loaded() { return 2;}
-_LT_EOF
-      echo "$LTCC $LTCFLAGS -c -o conftest.o conftest.c" >&5
-      $LTCC $LTCFLAGS -c -o conftest.o conftest.c 2>&5
-      echo "$AR cru libconftest.a conftest.o" >&5
-      $AR cru libconftest.a conftest.o 2>&5
-      echo "$RANLIB libconftest.a" >&5
-      $RANLIB libconftest.a 2>&5
-      cat > conftest.c << _LT_EOF
-int main() { return 0;}
-_LT_EOF
-      echo "$LTCC $LTCFLAGS $LDFLAGS -o conftest conftest.c -Wl,-force_load,./libconftest.a" >&5
-      $LTCC $LTCFLAGS $LDFLAGS -o conftest conftest.c -Wl,-force_load,./libconftest.a 2>conftest.err
-      _lt_result=$?
-      if test -s conftest.err && $GREP force_load conftest.err; then
-	cat conftest.err >&5
-      elif test -f conftest && test $_lt_result -eq 0 && $GREP forced_load conftest >/dev/null 2>&1 ; then
-	lt_cv_ld_force_load=yes
-      else
-	cat conftest.err >&5
-      fi
-        rm -f conftest.err libconftest.a conftest conftest.c
-        rm -rf conftest.dSYM
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_ld_force_load" >&5
-$as_echo "$lt_cv_ld_force_load" >&6; }
-    case $host_os in
-    rhapsody* | darwin1.[012])
-      _lt_dar_allow_undefined='${wl}-undefined ${wl}suppress' ;;
-    darwin1.*)
-      _lt_dar_allow_undefined='${wl}-flat_namespace ${wl}-undefined ${wl}suppress' ;;
-    darwin*) # darwin 5.x on
-      # if running on 10.5 or later, the deployment target defaults
-      # to the OS version, if on x86, and 10.4, the deployment
-      # target defaults to 10.4. Don't you love it?
-      case ${MACOSX_DEPLOYMENT_TARGET-10.0},$host in
-	10.0,*86*-darwin8*|10.0,*-darwin[91]*)
-	  _lt_dar_allow_undefined='${wl}-undefined ${wl}dynamic_lookup' ;;
-	10.[012]*)
-	  _lt_dar_allow_undefined='${wl}-flat_namespace ${wl}-undefined ${wl}suppress' ;;
-	10.*)
-	  _lt_dar_allow_undefined='${wl}-undefined ${wl}dynamic_lookup' ;;
-      esac
-    ;;
-  esac
-    if test "$lt_cv_apple_cc_single_mod" = "yes"; then
-      _lt_dar_single_mod='$single_module'
-    fi
-    if test "$lt_cv_ld_exported_symbols_list" = "yes"; then
-      _lt_dar_export_syms=' ${wl}-exported_symbols_list,$output_objdir/${libname}-symbols.expsym'
-    else
-      _lt_dar_export_syms='~$NMEDIT -s $output_objdir/${libname}-symbols.expsym ${lib}'
-    fi
-    if test "$DSYMUTIL" != ":" && test "$lt_cv_ld_force_load" = "no"; then
-      _lt_dsymutil='~$DSYMUTIL $lib || :'
-    else
-      _lt_dsymutil=
-    fi
-    ;;
-  esac
-
-ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking how to run the C preprocessor" >&5
-$as_echo_n "checking how to run the C preprocessor... " >&6; }
-# On Suns, sometimes $CPP names a directory.
-if test -n "$CPP" && test -d "$CPP"; then
-  CPP=
-fi
-if test -z "$CPP"; then
-  if test "${ac_cv_prog_CPP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-      # Double quotes because CPP needs to be expanded
-    for CPP in "$CC -E" "$CC -E -traditional-cpp" "/lib/cpp"
-    do
-      ac_preproc_ok=false
-for ac_c_preproc_warn_flag in '' yes
-do
-  # Use a header file that comes with gcc, so configuring glibc
-  # with a fresh cross-compiler works.
-  # Prefer <limits.h> to <assert.h> if __STDC__ is defined, since
-  # <limits.h> exists even on freestanding compilers.
-  # On the NeXT, cc -E runs the code through the compiler's parser,
-  # not just through cpp. "Syntax error" is here to catch this case.
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#ifdef __STDC__
-# include <limits.h>
-#else
-# include <assert.h>
-#endif
-		     Syntax error
-_ACEOF
-if ac_fn_c_try_cpp "$LINENO"; then :
-
-else
-  # Broken: fails on valid input.
-continue
-fi
-rm -f conftest.err conftest.i conftest.$ac_ext
-
-  # OK, works on sane cases.  Now check whether nonexistent headers
-  # can be detected and how.
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#include <ac_nonexistent.h>
-_ACEOF
-if ac_fn_c_try_cpp "$LINENO"; then :
-  # Broken: success on invalid input.
-continue
-else
-  # Passes both tests.
-ac_preproc_ok=:
-break
-fi
-rm -f conftest.err conftest.i conftest.$ac_ext
-
-done
-# Because of `break', _AC_PREPROC_IFELSE's cleaning code was skipped.
-rm -f conftest.i conftest.err conftest.$ac_ext
-if $ac_preproc_ok; then :
-  break
-fi
-
-    done
-    ac_cv_prog_CPP=$CPP
-
-fi
-  CPP=$ac_cv_prog_CPP
-else
-  ac_cv_prog_CPP=$CPP
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $CPP" >&5
-$as_echo "$CPP" >&6; }
-ac_preproc_ok=false
-for ac_c_preproc_warn_flag in '' yes
-do
-  # Use a header file that comes with gcc, so configuring glibc
-  # with a fresh cross-compiler works.
-  # Prefer <limits.h> to <assert.h> if __STDC__ is defined, since
-  # <limits.h> exists even on freestanding compilers.
-  # On the NeXT, cc -E runs the code through the compiler's parser,
-  # not just through cpp. "Syntax error" is here to catch this case.
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#ifdef __STDC__
-# include <limits.h>
-#else
-# include <assert.h>
-#endif
-		     Syntax error
-_ACEOF
-if ac_fn_c_try_cpp "$LINENO"; then :
-
-else
-  # Broken: fails on valid input.
-continue
-fi
-rm -f conftest.err conftest.i conftest.$ac_ext
-
-  # OK, works on sane cases.  Now check whether nonexistent headers
-  # can be detected and how.
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#include <ac_nonexistent.h>
-_ACEOF
-if ac_fn_c_try_cpp "$LINENO"; then :
-  # Broken: success on invalid input.
-continue
-else
-  # Passes both tests.
-ac_preproc_ok=:
-break
-fi
-rm -f conftest.err conftest.i conftest.$ac_ext
-
-done
-# Because of `break', _AC_PREPROC_IFELSE's cleaning code was skipped.
-rm -f conftest.i conftest.err conftest.$ac_ext
-if $ac_preproc_ok; then :
-
-else
-  { { $as_echo "$as_me:${as_lineno-$LINENO}: error: in \`$ac_pwd':" >&5
-$as_echo "$as_me: error: in \`$ac_pwd':" >&2;}
-as_fn_error $? "C preprocessor \"$CPP\" fails sanity check
-See \`config.log' for more details" "$LINENO" 5 ; }
-fi
-
-ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for ANSI C header files" >&5
-$as_echo_n "checking for ANSI C header files... " >&6; }
-if test "${ac_cv_header_stdc+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#include <stdlib.h>
-#include <stdarg.h>
-#include <string.h>
-#include <float.h>
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_compile "$LINENO"; then :
-  ac_cv_header_stdc=yes
-else
-  ac_cv_header_stdc=no
-fi
-rm -f core conftest.err conftest.$ac_objext conftest.$ac_ext
-
-if test $ac_cv_header_stdc = yes; then
-  # SunOS 4.x string.h does not declare mem*, contrary to ANSI.
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#include <string.h>
-
-_ACEOF
-if (eval "$ac_cpp conftest.$ac_ext") 2>&5 |
-  $EGREP "memchr" >/dev/null 2>&1; then :
-
-else
-  ac_cv_header_stdc=no
-fi
-rm -f conftest*
-
-fi
-
-if test $ac_cv_header_stdc = yes; then
-  # ISC 2.0.2 stdlib.h does not declare free, contrary to ANSI.
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#include <stdlib.h>
-
-_ACEOF
-if (eval "$ac_cpp conftest.$ac_ext") 2>&5 |
-  $EGREP "free" >/dev/null 2>&1; then :
-
-else
-  ac_cv_header_stdc=no
-fi
-rm -f conftest*
-
-fi
-
-if test $ac_cv_header_stdc = yes; then
-  # /bin/cc in Irix-4.0.5 gets non-ANSI ctype macros unless using -ansi.
-  if test "$cross_compiling" = yes; then :
-  :
-else
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#include <ctype.h>
-#include <stdlib.h>
-#if ((' ' & 0x0FF) == 0x020)
-# define ISLOWER(c) ('a' <= (c) && (c) <= 'z')
-# define TOUPPER(c) (ISLOWER(c) ? 'A' + ((c) - 'a') : (c))
-#else
-# define ISLOWER(c) \
-		   (('a' <= (c) && (c) <= 'i') \
-		     || ('j' <= (c) && (c) <= 'r') \
-		     || ('s' <= (c) && (c) <= 'z'))
-# define TOUPPER(c) (ISLOWER(c) ? ((c) | 0x40) : (c))
-#endif
-
-#define XOR(e, f) (((e) && !(f)) || (!(e) && (f)))
-int
-main ()
-{
-  int i;
-  for (i = 0; i < 256; i++)
-    if (XOR (islower (i), ISLOWER (i))
-	|| toupper (i) != TOUPPER (i))
-      return 2;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_run "$LINENO"; then :
-
-else
-  ac_cv_header_stdc=no
-fi
-rm -f core *.core core.conftest.* gmon.out bb.out conftest$ac_exeext \
-  conftest.$ac_objext conftest.beam conftest.$ac_ext
-fi
-
-fi
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_header_stdc" >&5
-$as_echo "$ac_cv_header_stdc" >&6; }
-if test $ac_cv_header_stdc = yes; then
-
-$as_echo "#define STDC_HEADERS 1" >>confdefs.h
-
-fi
-
-# On IRIX 5.3, sys/types and inttypes.h are conflicting.
-for ac_header in sys/types.h sys/stat.h stdlib.h string.h memory.h strings.h \
-		  inttypes.h stdint.h unistd.h
-do :
-  as_ac_Header=`$as_echo "ac_cv_header_$ac_header" | $as_tr_sh`
-ac_fn_c_check_header_compile "$LINENO" "$ac_header" "$as_ac_Header" "$ac_includes_default
-"
-if eval test \"x\$"$as_ac_Header"\" = x"yes"; then :
-  cat >>confdefs.h <<_ACEOF
-#define `$as_echo "HAVE_$ac_header" | $as_tr_cpp` 1
-_ACEOF
-
-fi
-
-done
-
-
-for ac_header in dlfcn.h
-do :
-  ac_fn_c_check_header_compile "$LINENO" "dlfcn.h" "ac_cv_header_dlfcn_h" "$ac_includes_default
-"
-if test "x$ac_cv_header_dlfcn_h" = x""yes; then :
-  cat >>confdefs.h <<_ACEOF
-#define HAVE_DLFCN_H 1
-_ACEOF
-
-fi
-
-done
-
-
-
-
-
-# Set options
-# Check whether --enable-static was given.
-if test "${enable_static+set}" = set; then :
-  enableval=$enable_static; p=${PACKAGE-default}
-    case $enableval in
-    yes) enable_static=yes ;;
-    no) enable_static=no ;;
-    *)
-     enable_static=no
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for pkg in $enableval; do
-	IFS="$lt_save_ifs"
-	if test "X$pkg" = "X$p"; then
-	  enable_static=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac
-else
-  enable_static=no
-fi
-
-
-
-
-
-
-
-enable_dlopen=yes
-enable_win32_dll=yes
-
-case $host in
-*-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-cegcc*)
-  if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}as", so it can be a program name with args.
-set dummy ${ac_tool_prefix}as; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_AS+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$AS"; then
-  ac_cv_prog_AS="$AS" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_AS="${ac_tool_prefix}as"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-AS=$ac_cv_prog_AS
-if test -n "$AS"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $AS" >&5
-$as_echo "$AS" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_AS"; then
-  ac_ct_AS=$AS
-  # Extract the first word of "as", so it can be a program name with args.
-set dummy as; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_AS+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_AS"; then
-  ac_cv_prog_ac_ct_AS="$ac_ct_AS" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_AS="as"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_AS=$ac_cv_prog_ac_ct_AS
-if test -n "$ac_ct_AS"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_AS" >&5
-$as_echo "$ac_ct_AS" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_AS" = x; then
-    AS="false"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    AS=$ac_ct_AS
-  fi
-else
-  AS="$ac_cv_prog_AS"
-fi
-
-  if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}dlltool", so it can be a program name with args.
-set dummy ${ac_tool_prefix}dlltool; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_DLLTOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$DLLTOOL"; then
-  ac_cv_prog_DLLTOOL="$DLLTOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_DLLTOOL="${ac_tool_prefix}dlltool"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-DLLTOOL=$ac_cv_prog_DLLTOOL
-if test -n "$DLLTOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $DLLTOOL" >&5
-$as_echo "$DLLTOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_DLLTOOL"; then
-  ac_ct_DLLTOOL=$DLLTOOL
-  # Extract the first word of "dlltool", so it can be a program name with args.
-set dummy dlltool; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_DLLTOOL+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_DLLTOOL"; then
-  ac_cv_prog_ac_ct_DLLTOOL="$ac_ct_DLLTOOL" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_DLLTOOL="dlltool"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_DLLTOOL=$ac_cv_prog_ac_ct_DLLTOOL
-if test -n "$ac_ct_DLLTOOL"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_DLLTOOL" >&5
-$as_echo "$ac_ct_DLLTOOL" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_DLLTOOL" = x; then
-    DLLTOOL="false"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    DLLTOOL=$ac_ct_DLLTOOL
-  fi
-else
-  DLLTOOL="$ac_cv_prog_DLLTOOL"
-fi
-
-  if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}objdump", so it can be a program name with args.
-set dummy ${ac_tool_prefix}objdump; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_OBJDUMP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$OBJDUMP"; then
-  ac_cv_prog_OBJDUMP="$OBJDUMP" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_OBJDUMP="${ac_tool_prefix}objdump"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-OBJDUMP=$ac_cv_prog_OBJDUMP
-if test -n "$OBJDUMP"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $OBJDUMP" >&5
-$as_echo "$OBJDUMP" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_OBJDUMP"; then
-  ac_ct_OBJDUMP=$OBJDUMP
-  # Extract the first word of "objdump", so it can be a program name with args.
-set dummy objdump; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_OBJDUMP+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_OBJDUMP"; then
-  ac_cv_prog_ac_ct_OBJDUMP="$ac_ct_OBJDUMP" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_OBJDUMP="objdump"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_OBJDUMP=$ac_cv_prog_ac_ct_OBJDUMP
-if test -n "$ac_ct_OBJDUMP"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_OBJDUMP" >&5
-$as_echo "$ac_ct_OBJDUMP" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_OBJDUMP" = x; then
-    OBJDUMP="false"
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    OBJDUMP=$ac_ct_OBJDUMP
-  fi
-else
-  OBJDUMP="$ac_cv_prog_OBJDUMP"
-fi
-
-  ;;
-esac
-
-test -z "$AS" && AS=as
-
-
-
-
-
-test -z "$DLLTOOL" && DLLTOOL=dlltool
-
-
-
-
-
-test -z "$OBJDUMP" && OBJDUMP=objdump
-
-
-
-
-
-
-
-
-
-            # Check whether --enable-shared was given.
-if test "${enable_shared+set}" = set; then :
-  enableval=$enable_shared; p=${PACKAGE-default}
-    case $enableval in
-    yes) enable_shared=yes ;;
-    no) enable_shared=no ;;
-    *)
-      enable_shared=no
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for pkg in $enableval; do
-	IFS="$lt_save_ifs"
-	if test "X$pkg" = "X$p"; then
-	  enable_shared=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac
-else
-  enable_shared=yes
-fi
-
-
-
-
-
-
-
-
-
-
-
-# Check whether --with-pic was given.
-if test "${with_pic+set}" = set; then :
-  withval=$with_pic; lt_p=${PACKAGE-default}
-    case $withval in
-    yes|no) pic_mode=$withval ;;
-    *)
-      pic_mode=default
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for lt_pkg in $withval; do
-	IFS="$lt_save_ifs"
-	if test "X$lt_pkg" = "X$lt_p"; then
-	  pic_mode=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac
-else
-  pic_mode=default
-fi
-
-
-test -z "$pic_mode" && pic_mode=default
-
-
-
-
-
-
-
-  # Check whether --enable-fast-install was given.
-if test "${enable_fast_install+set}" = set; then :
-  enableval=$enable_fast_install; p=${PACKAGE-default}
-    case $enableval in
-    yes) enable_fast_install=yes ;;
-    no) enable_fast_install=no ;;
-    *)
-      enable_fast_install=no
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for pkg in $enableval; do
-	IFS="$lt_save_ifs"
-	if test "X$pkg" = "X$p"; then
-	  enable_fast_install=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac
-else
-  enable_fast_install=yes
-fi
-
-
-
-
-
-
-
-
-
-
-
-# This can be used to rebuild libtool when needed
-LIBTOOL_DEPS="$ltmain"
-
-# Always use our own libtool.
-LIBTOOL='$(SHELL) $(top_builddir)/libtool'
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-test -z "$LN_S" && LN_S="ln -s"
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-if test -n "${ZSH_VERSION+set}" ; then
-   setopt NO_GLOB_SUBST
-fi
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for objdir" >&5
-$as_echo_n "checking for objdir... " >&6; }
-if test "${lt_cv_objdir+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  rm -f .libs 2>/dev/null
-mkdir .libs 2>/dev/null
-if test -d .libs; then
-  lt_cv_objdir=.libs
-else
-  # MS-DOS does not allow filenames that begin with a dot.
-  lt_cv_objdir=_libs
-fi
-rmdir .libs 2>/dev/null
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_objdir" >&5
-$as_echo "$lt_cv_objdir" >&6; }
-objdir=$lt_cv_objdir
-
-
-
-
-
-cat >>confdefs.h <<_ACEOF
-#define LT_OBJDIR "$lt_cv_objdir/"
-_ACEOF
-
-
-
-
-case $host_os in
-aix3*)
-  # AIX sometimes has problems with the GCC collect2 program.  For some
-  # reason, if we set the COLLECT_NAMES environment variable, the problems
-  # vanish in a puff of smoke.
-  if test "X${COLLECT_NAMES+set}" != Xset; then
-    COLLECT_NAMES=
-    export COLLECT_NAMES
-  fi
-  ;;
-esac
-
-# Global variables:
-ofile=libtool
-can_build_shared=yes
-
-# All known linkers require a `.a' archive for static linking (except MSVC,
-# which needs '.lib').
-libext=a
-
-with_gnu_ld="$lt_cv_prog_gnu_ld"
-
-old_CC="$CC"
-old_CFLAGS="$CFLAGS"
-
-# Set sane defaults for various variables
-test -z "$CC" && CC=cc
-test -z "$LTCC" && LTCC=$CC
-test -z "$LTCFLAGS" && LTCFLAGS=$CFLAGS
-test -z "$LD" && LD=ld
-test -z "$ac_objext" && ac_objext=o
-
-for cc_temp in $compiler""; do
-  case $cc_temp in
-    compile | *[\\/]compile | ccache | *[\\/]ccache ) ;;
-    distcc | *[\\/]distcc | purify | *[\\/]purify ) ;;
-    \-*) ;;
-    *) break;;
-  esac
-done
-cc_basename=`$ECHO "$cc_temp" | $SED "s%.*/%%; s%^$host_alias-%%"`
-
-
-# Only perform the check for file, if the check method requires it
-test -z "$MAGIC_CMD" && MAGIC_CMD=file
-case $deplibs_check_method in
-file_magic*)
-  if test "$file_magic_cmd" = '$MAGIC_CMD'; then
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking for ${ac_tool_prefix}file" >&5
-$as_echo_n "checking for ${ac_tool_prefix}file... " >&6; }
-if test "${lt_cv_path_MAGIC_CMD+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  case $MAGIC_CMD in
-[\\/*] |  ?:[\\/]*)
-  lt_cv_path_MAGIC_CMD="$MAGIC_CMD" # Let the user override the test with a path.
-  ;;
-*)
-  lt_save_MAGIC_CMD="$MAGIC_CMD"
-  lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-  ac_dummy="/usr/bin$PATH_SEPARATOR$PATH"
-  for ac_dir in $ac_dummy; do
-    IFS="$lt_save_ifs"
-    test -z "$ac_dir" && ac_dir=.
-    if test -f $ac_dir/${ac_tool_prefix}file; then
-      lt_cv_path_MAGIC_CMD="$ac_dir/${ac_tool_prefix}file"
-      if test -n "$file_magic_test_file"; then
-	case $deplibs_check_method in
-	"file_magic "*)
-	  file_magic_regex=`expr "$deplibs_check_method" : "file_magic \(.*\)"`
-	  MAGIC_CMD="$lt_cv_path_MAGIC_CMD"
-	  if eval $file_magic_cmd \$file_magic_test_file 2> /dev/null |
-	    $EGREP "$file_magic_regex" > /dev/null; then
-	    :
-	  else
-	    cat <<_LT_EOF 1>&2
-
-*** Warning: the command libtool uses to detect shared libraries,
-*** $file_magic_cmd, produces output that libtool cannot recognize.
-*** The result is that libtool may fail to recognize shared libraries
-*** as such.  This will affect the creation of libtool libraries that
-*** depend on shared libraries, but programs linked with such libtool
-*** libraries will work regardless of this problem.  Nevertheless, you
-*** may want to report the problem to your system manager and/or to
-*** bug-libtool@gnu.org
-
-_LT_EOF
-	  fi ;;
-	esac
-      fi
-      break
-    fi
-  done
-  IFS="$lt_save_ifs"
-  MAGIC_CMD="$lt_save_MAGIC_CMD"
-  ;;
-esac
-fi
-
-MAGIC_CMD="$lt_cv_path_MAGIC_CMD"
-if test -n "$MAGIC_CMD"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $MAGIC_CMD" >&5
-$as_echo "$MAGIC_CMD" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-
-
-
-if test -z "$lt_cv_path_MAGIC_CMD"; then
-  if test -n "$ac_tool_prefix"; then
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking for file" >&5
-$as_echo_n "checking for file... " >&6; }
-if test "${lt_cv_path_MAGIC_CMD+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  case $MAGIC_CMD in
-[\\/*] |  ?:[\\/]*)
-  lt_cv_path_MAGIC_CMD="$MAGIC_CMD" # Let the user override the test with a path.
-  ;;
-*)
-  lt_save_MAGIC_CMD="$MAGIC_CMD"
-  lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-  ac_dummy="/usr/bin$PATH_SEPARATOR$PATH"
-  for ac_dir in $ac_dummy; do
-    IFS="$lt_save_ifs"
-    test -z "$ac_dir" && ac_dir=.
-    if test -f $ac_dir/file; then
-      lt_cv_path_MAGIC_CMD="$ac_dir/file"
-      if test -n "$file_magic_test_file"; then
-	case $deplibs_check_method in
-	"file_magic "*)
-	  file_magic_regex=`expr "$deplibs_check_method" : "file_magic \(.*\)"`
-	  MAGIC_CMD="$lt_cv_path_MAGIC_CMD"
-	  if eval $file_magic_cmd \$file_magic_test_file 2> /dev/null |
-	    $EGREP "$file_magic_regex" > /dev/null; then
-	    :
-	  else
-	    cat <<_LT_EOF 1>&2
-
-*** Warning: the command libtool uses to detect shared libraries,
-*** $file_magic_cmd, produces output that libtool cannot recognize.
-*** The result is that libtool may fail to recognize shared libraries
-*** as such.  This will affect the creation of libtool libraries that
-*** depend on shared libraries, but programs linked with such libtool
-*** libraries will work regardless of this problem.  Nevertheless, you
-*** may want to report the problem to your system manager and/or to
-*** bug-libtool@gnu.org
-
-_LT_EOF
-	  fi ;;
-	esac
-      fi
-      break
-    fi
-  done
-  IFS="$lt_save_ifs"
-  MAGIC_CMD="$lt_save_MAGIC_CMD"
-  ;;
-esac
-fi
-
-MAGIC_CMD="$lt_cv_path_MAGIC_CMD"
-if test -n "$MAGIC_CMD"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $MAGIC_CMD" >&5
-$as_echo "$MAGIC_CMD" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-  else
-    MAGIC_CMD=:
-  fi
-fi
-
-  fi
-  ;;
-esac
-
-# Use C for the default configuration in the libtool script
-
-lt_save_CC="$CC"
-ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-
-
-# Source file extension for C test sources.
-ac_ext=c
-
-# Object file extension for compiled C test sources.
-objext=o
-objext=$objext
-
-# Code to be used in simple compile tests
-lt_simple_compile_test_code="int some_variable = 0;"
-
-# Code to be used in simple link tests
-lt_simple_link_test_code='int main(){return(0);}'
-
-
-
-
-
-
-
-# If no C compiler was specified, use CC.
-LTCC=${LTCC-"$CC"}
-
-# If no C compiler flags were specified, use CFLAGS.
-LTCFLAGS=${LTCFLAGS-"$CFLAGS"}
-
-# Allow CC to be a program name with arguments.
-compiler=$CC
-
-# Save the default compiler, since it gets overwritten when the other
-# tags are being tested, and _LT_TAGVAR(compiler, []) is a NOP.
-compiler_DEFAULT=$CC
-
-# save warnings/boilerplate of simple test code
-ac_outfile=conftest.$ac_objext
-echo "$lt_simple_compile_test_code" >conftest.$ac_ext
-eval "$ac_compile" 2>&1 >/dev/null | $SED '/^$/d; /^ *+/d' >conftest.err
-_lt_compiler_boilerplate=`cat conftest.err`
-$RM conftest*
-
-ac_outfile=conftest.$ac_objext
-echo "$lt_simple_link_test_code" >conftest.$ac_ext
-eval "$ac_link" 2>&1 >/dev/null | $SED '/^$/d; /^ *+/d' >conftest.err
-_lt_linker_boilerplate=`cat conftest.err`
-$RM -r conftest*
-
-
-## CAVEAT EMPTOR:
-## There is no encapsulation within the following macros, do not change
-## the running order or otherwise move them around unless you know exactly
-## what you are doing...
-if test -n "$compiler"; then
-
-lt_prog_compiler_no_builtin_flag=
-
-if test "$GCC" = yes; then
-  case $cc_basename in
-  nvcc*)
-    lt_prog_compiler_no_builtin_flag=' -Xcompiler -fno-builtin' ;;
-  *)
-    lt_prog_compiler_no_builtin_flag=' -fno-builtin' ;;
-  esac
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler supports -fno-rtti -fno-exceptions" >&5
-$as_echo_n "checking if $compiler supports -fno-rtti -fno-exceptions... " >&6; }
-if test "${lt_cv_prog_compiler_rtti_exceptions+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_rtti_exceptions=no
-   ac_outfile=conftest.$ac_objext
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-   lt_compiler_flag="-fno-rtti -fno-exceptions"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   # The option is referenced via a variable to avoid confusing sed.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [^ ]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&5)
-   (eval "$lt_compile" 2>conftest.err)
-   ac_status=$?
-   cat conftest.err >&5
-   echo "$as_me:$LINENO: \$? = $ac_status" >&5
-   if (exit $ac_status) && test -s "$ac_outfile"; then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings other than the usual output.
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' >conftest.exp
-     $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-     if test ! -s conftest.er2 || diff conftest.exp conftest.er2 >/dev/null; then
-       lt_cv_prog_compiler_rtti_exceptions=yes
-     fi
-   fi
-   $RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_rtti_exceptions" >&5
-$as_echo "$lt_cv_prog_compiler_rtti_exceptions" >&6; }
-
-if test x"$lt_cv_prog_compiler_rtti_exceptions" = xyes; then
-    lt_prog_compiler_no_builtin_flag="$lt_prog_compiler_no_builtin_flag -fno-rtti -fno-exceptions"
-else
-    :
-fi
-
-fi
-
-
-
-
-
-
-  lt_prog_compiler_wl=
-lt_prog_compiler_pic=
-lt_prog_compiler_static=
-
-
-  if test "$GCC" = yes; then
-    lt_prog_compiler_wl='-Wl,'
-    lt_prog_compiler_static='-static'
-
-    case $host_os in
-      aix*)
-      # All AIX code is PIC.
-      if test "$host_cpu" = ia64; then
-	# AIX 5 now supports IA64 processor
-	lt_prog_compiler_static='-Bstatic'
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            lt_prog_compiler_pic='-fPIC'
-        ;;
-      m68k)
-            # FIXME: we need at least 68020 code to build shared libraries, but
-            # adding the `-m68020' flag to GCC prevents building anything better,
-            # like `-m68040'.
-            lt_prog_compiler_pic='-m68020 -resident32 -malways-restore-a4'
-        ;;
-      esac
-      ;;
-
-    beos* | irix5* | irix6* | nonstopux* | osf3* | osf4* | osf5*)
-      # PIC is the default for these OSes.
-      ;;
-
-    mingw* | cygwin* | pw32* | os2* | cegcc*)
-      # This hack is so that the source file can tell whether it is being
-      # built for inclusion in a dll (and should export symbols for example).
-      # Although the cygwin gcc ignores -fPIC, still need this for old-style
-      # (--disable-auto-import) libraries
-      lt_prog_compiler_pic='-DDLL_EXPORT'
-      ;;
-
-    darwin* | rhapsody*)
-      # PIC is the default on this platform
-      # Common symbols not allowed in MH_DYLIB files
-      lt_prog_compiler_pic='-fno-common'
-      ;;
-
-    haiku*)
-      # PIC is the default for Haiku.
-      # The "-static" flag exists, but is broken.
-      lt_prog_compiler_static=
-      ;;
-
-    hpux*)
-      # PIC is the default for 64-bit PA HP-UX, but not for 32-bit
-      # PA HP-UX.  On IA64 HP-UX, PIC is the default but the pic flag
-      # sets the default TLS model and affects inlining.
-      case $host_cpu in
-      hppa*64*)
-	# +Z the default
-	;;
-      *)
-	lt_prog_compiler_pic='-fPIC'
-	;;
-      esac
-      ;;
-
-    interix[3-9]*)
-      # Interix 3.x gcc -fpic/-fPIC options generate broken code.
-      # Instead, we relocate shared libraries at runtime.
-      ;;
-
-    msdosdjgpp*)
-      # Just because we use GCC doesn't mean we suddenly get shared libraries
-      # on systems that don't support them.
-      lt_prog_compiler_can_build_shared=no
-      enable_shared=no
-      ;;
-
-    *nto* | *qnx*)
-      # QNX uses GNU C++, but need to define -shared option too, otherwise
-      # it will coredump.
-      lt_prog_compiler_pic='-fPIC -shared'
-      ;;
-
-    sysv4*MP*)
-      if test -d /usr/nec; then
-	lt_prog_compiler_pic=-Kconform_pic
-      fi
-      ;;
-
-    *)
-      lt_prog_compiler_pic='-fPIC'
-      ;;
-    esac
-
-    case $cc_basename in
-    nvcc*) # Cuda Compiler Driver 2.2
-      lt_prog_compiler_wl='-Xlinker '
-      if test -n "$lt_prog_compiler_pic"; then
-        lt_prog_compiler_pic="-Xcompiler $lt_prog_compiler_pic"
-      fi
-      ;;
-    esac
-  else
-    # PORTME Check for flag to pass linker flags through the system compiler.
-    case $host_os in
-    aix*)
-      lt_prog_compiler_wl='-Wl,'
-      if test "$host_cpu" = ia64; then
-	# AIX 5 now supports IA64 processor
-	lt_prog_compiler_static='-Bstatic'
-      else
-	lt_prog_compiler_static='-bnso -bI:/lib/syscalls.exp'
-      fi
-      ;;
-
-    mingw* | cygwin* | pw32* | os2* | cegcc*)
-      # This hack is so that the source file can tell whether it is being
-      # built for inclusion in a dll (and should export symbols for example).
-      lt_prog_compiler_pic='-DDLL_EXPORT'
-      ;;
-
-    hpux9* | hpux10* | hpux11*)
-      lt_prog_compiler_wl='-Wl,'
-      # PIC is the default for IA64 HP-UX and 64-bit HP-UX, but
-      # not for PA HP-UX.
-      case $host_cpu in
-      hppa*64*|ia64*)
-	# +Z the default
-	;;
-      *)
-	lt_prog_compiler_pic='+Z'
-	;;
-      esac
-      # Is there a better lt_prog_compiler_static that works with the bundled CC?
-      lt_prog_compiler_static='${wl}-a ${wl}archive'
-      ;;
-
-    irix5* | irix6* | nonstopux*)
-      lt_prog_compiler_wl='-Wl,'
-      # PIC (with -KPIC) is the default.
-      lt_prog_compiler_static='-non_shared'
-      ;;
-
-    linux* | k*bsd*-gnu | kopensolaris*-gnu)
-      case $cc_basename in
-      # old Intel for x86_64 which still supported -KPIC.
-      ecc*)
-	lt_prog_compiler_wl='-Wl,'
-	lt_prog_compiler_pic='-KPIC'
-	lt_prog_compiler_static='-static'
-        ;;
-      # icc used to be incompatible with GCC.
-      # ICC 10 doesn't accept -KPIC any more.
-      icc* | ifort*)
-	lt_prog_compiler_wl='-Wl,'
-	lt_prog_compiler_pic='-fPIC'
-	lt_prog_compiler_static='-static'
-        ;;
-      # Lahey Fortran 8.1.
-      lf95*)
-	lt_prog_compiler_wl='-Wl,'
-	lt_prog_compiler_pic='--shared'
-	lt_prog_compiler_static='--static'
-	;;
-      nagfor*)
-	# NAG Fortran compiler
-	lt_prog_compiler_wl='-Wl,-Wl,,'
-	lt_prog_compiler_pic='-PIC'
-	lt_prog_compiler_static='-Bstatic'
-	;;
-      pgcc* | pgf77* | pgf90* | pgf95* | pgfortran*)
-        # Portland Group compilers (*not* the Pentium gcc compiler,
-	# which looks to be a dead project)
-	lt_prog_compiler_wl='-Wl,'
-	lt_prog_compiler_pic='-fpic'
-	lt_prog_compiler_static='-Bstatic'
-        ;;
-      ccc*)
-        lt_prog_compiler_wl='-Wl,'
-        # All Alpha code is PIC.
-        lt_prog_compiler_static='-non_shared'
-        ;;
-      xl* | bgxl* | bgf* | mpixl*)
-	# IBM XL C 8.0/Fortran 10.1, 11.1 on PPC and BlueGene
-	lt_prog_compiler_wl='-Wl,'
-	lt_prog_compiler_pic='-qpic'
-	lt_prog_compiler_static='-qstaticlink'
-	;;
-      *)
-	case `$CC -V 2>&1 | sed 5q` in
-	*Sun\ Ceres\ Fortran* | *Sun*Fortran*\ [1-7].* | *Sun*Fortran*\ 8.[0-3]*)
-	  # Sun Fortran 8.3 passes all unrecognized flags to the linker
-	  lt_prog_compiler_pic='-KPIC'
-	  lt_prog_compiler_static='-Bstatic'
-	  lt_prog_compiler_wl=''
-	  ;;
-	*Sun\ F* | *Sun*Fortran*)
-	  lt_prog_compiler_pic='-KPIC'
-	  lt_prog_compiler_static='-Bstatic'
-	  lt_prog_compiler_wl='-Qoption ld '
-	  ;;
-	*Sun\ C*)
-	  # Sun C 5.9
-	  lt_prog_compiler_pic='-KPIC'
-	  lt_prog_compiler_static='-Bstatic'
-	  lt_prog_compiler_wl='-Wl,'
-	  ;;
-        *Intel*\ [CF]*Compiler*)
-	  lt_prog_compiler_wl='-Wl,'
-	  lt_prog_compiler_pic='-fPIC'
-	  lt_prog_compiler_static='-static'
-	  ;;
-	*Portland\ Group*)
-	  lt_prog_compiler_wl='-Wl,'
-	  lt_prog_compiler_pic='-fpic'
-	  lt_prog_compiler_static='-Bstatic'
-	  ;;
-	esac
-	;;
-      esac
-      ;;
-
-    newsos6)
-      lt_prog_compiler_pic='-KPIC'
-      lt_prog_compiler_static='-Bstatic'
-      ;;
-
-    *nto* | *qnx*)
-      # QNX uses GNU C++, but need to define -shared option too, otherwise
-      # it will coredump.
-      lt_prog_compiler_pic='-fPIC -shared'
-      ;;
-
-    osf3* | osf4* | osf5*)
-      lt_prog_compiler_wl='-Wl,'
-      # All OSF/1 code is PIC.
-      lt_prog_compiler_static='-non_shared'
-      ;;
-
-    rdos*)
-      lt_prog_compiler_static='-non_shared'
-      ;;
-
-    solaris*)
-      lt_prog_compiler_pic='-KPIC'
-      lt_prog_compiler_static='-Bstatic'
-      case $cc_basename in
-      f77* | f90* | f95* | sunf77* | sunf90* | sunf95*)
-	lt_prog_compiler_wl='-Qoption ld ';;
-      *)
-	lt_prog_compiler_wl='-Wl,';;
-      esac
-      ;;
-
-    sunos4*)
-      lt_prog_compiler_wl='-Qoption ld '
-      lt_prog_compiler_pic='-PIC'
-      lt_prog_compiler_static='-Bstatic'
-      ;;
-
-    sysv4 | sysv4.2uw2* | sysv4.3*)
-      lt_prog_compiler_wl='-Wl,'
-      lt_prog_compiler_pic='-KPIC'
-      lt_prog_compiler_static='-Bstatic'
-      ;;
-
-    sysv4*MP*)
-      if test -d /usr/nec ;then
-	lt_prog_compiler_pic='-Kconform_pic'
-	lt_prog_compiler_static='-Bstatic'
-      fi
-      ;;
-
-    sysv5* | unixware* | sco3.2v5* | sco5v6* | OpenUNIX*)
-      lt_prog_compiler_wl='-Wl,'
-      lt_prog_compiler_pic='-KPIC'
-      lt_prog_compiler_static='-Bstatic'
-      ;;
-
-    unicos*)
-      lt_prog_compiler_wl='-Wl,'
-      lt_prog_compiler_can_build_shared=no
-      ;;
-
-    uts4*)
-      lt_prog_compiler_pic='-pic'
-      lt_prog_compiler_static='-Bstatic'
-      ;;
-
-    *)
-      lt_prog_compiler_can_build_shared=no
-      ;;
-    esac
-  fi
-
-case $host_os in
-  # For platforms which do not support PIC, -DPIC is meaningless:
-  *djgpp*)
-    lt_prog_compiler_pic=
-    ;;
-  *)
-    lt_prog_compiler_pic="$lt_prog_compiler_pic -DPIC"
-    ;;
-esac
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $compiler option to produce PIC" >&5
-$as_echo_n "checking for $compiler option to produce PIC... " >&6; }
-if test "${lt_cv_prog_compiler_pic+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_pic=$lt_prog_compiler_pic
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_pic" >&5
-$as_echo "$lt_cv_prog_compiler_pic" >&6; }
-lt_prog_compiler_pic=$lt_cv_prog_compiler_pic
-
-#
-# Check to make sure the PIC flag actually works.
-#
-if test -n "$lt_prog_compiler_pic"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler PIC flag $lt_prog_compiler_pic works" >&5
-$as_echo_n "checking if $compiler PIC flag $lt_prog_compiler_pic works... " >&6; }
-if test "${lt_cv_prog_compiler_pic_works+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_pic_works=no
-   ac_outfile=conftest.$ac_objext
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-   lt_compiler_flag="$lt_prog_compiler_pic -DPIC"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   # The option is referenced via a variable to avoid confusing sed.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [^ ]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&5)
-   (eval "$lt_compile" 2>conftest.err)
-   ac_status=$?
-   cat conftest.err >&5
-   echo "$as_me:$LINENO: \$? = $ac_status" >&5
-   if (exit $ac_status) && test -s "$ac_outfile"; then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings other than the usual output.
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' >conftest.exp
-     $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-     if test ! -s conftest.er2 || diff conftest.exp conftest.er2 >/dev/null; then
-       lt_cv_prog_compiler_pic_works=yes
-     fi
-   fi
-   $RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_pic_works" >&5
-$as_echo "$lt_cv_prog_compiler_pic_works" >&6; }
-
-if test x"$lt_cv_prog_compiler_pic_works" = xyes; then
-    case $lt_prog_compiler_pic in
-     "" | " "*) ;;
-     *) lt_prog_compiler_pic=" $lt_prog_compiler_pic" ;;
-     esac
-else
-    lt_prog_compiler_pic=
-     lt_prog_compiler_can_build_shared=no
-fi
-
-fi
-
-
-
-
-
-
-
-
-
-
-
-#
-# Check to make sure the static flag actually works.
-#
-wl=$lt_prog_compiler_wl eval lt_tmp_static_flag=\"$lt_prog_compiler_static\"
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler static flag $lt_tmp_static_flag works" >&5
-$as_echo_n "checking if $compiler static flag $lt_tmp_static_flag works... " >&6; }
-if test "${lt_cv_prog_compiler_static_works+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_static_works=no
-   save_LDFLAGS="$LDFLAGS"
-   LDFLAGS="$LDFLAGS $lt_tmp_static_flag"
-   echo "$lt_simple_link_test_code" > conftest.$ac_ext
-   if (eval $ac_link 2>conftest.err) && test -s conftest$ac_exeext; then
-     # The linker can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     if test -s conftest.err; then
-       # Append any errors to the config.log.
-       cat conftest.err 1>&5
-       $ECHO "$_lt_linker_boilerplate" | $SED '/^$/d' > conftest.exp
-       $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-       if diff conftest.exp conftest.er2 >/dev/null; then
-         lt_cv_prog_compiler_static_works=yes
-       fi
-     else
-       lt_cv_prog_compiler_static_works=yes
-     fi
-   fi
-   $RM -r conftest*
-   LDFLAGS="$save_LDFLAGS"
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_static_works" >&5
-$as_echo "$lt_cv_prog_compiler_static_works" >&6; }
-
-if test x"$lt_cv_prog_compiler_static_works" = xyes; then
-    :
-else
-    lt_prog_compiler_static=
-fi
-
-
-
-
-
-
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler supports -c -o file.$ac_objext" >&5
-$as_echo_n "checking if $compiler supports -c -o file.$ac_objext... " >&6; }
-if test "${lt_cv_prog_compiler_c_o+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_c_o=no
-   $RM -r conftest 2>/dev/null
-   mkdir conftest
-   cd conftest
-   mkdir out
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-   lt_compiler_flag="-o out/conftest2.$ac_objext"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [^ ]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&5)
-   (eval "$lt_compile" 2>out/conftest.err)
-   ac_status=$?
-   cat out/conftest.err >&5
-   echo "$as_me:$LINENO: \$? = $ac_status" >&5
-   if (exit $ac_status) && test -s out/conftest2.$ac_objext
-   then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' > out/conftest.exp
-     $SED '/^$/d; /^ *+/d' out/conftest.err >out/conftest.er2
-     if test ! -s out/conftest.er2 || diff out/conftest.exp out/conftest.er2 >/dev/null; then
-       lt_cv_prog_compiler_c_o=yes
-     fi
-   fi
-   chmod u+w . 2>&5
-   $RM conftest*
-   # SGI C++ compiler will create directory out/ii_files/ for
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-   test -d out/ii_files && $RM out/ii_files/* && rmdir out/ii_files
-   $RM out/* && rmdir out
-   cd ..
-   $RM -r conftest
-   $RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_c_o" >&5
-$as_echo "$lt_cv_prog_compiler_c_o" >&6; }
-
-
-
-
-
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler supports -c -o file.$ac_objext" >&5
-$as_echo_n "checking if $compiler supports -c -o file.$ac_objext... " >&6; }
-if test "${lt_cv_prog_compiler_c_o+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_c_o=no
-   $RM -r conftest 2>/dev/null
-   mkdir conftest
-   cd conftest
-   mkdir out
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-   lt_compiler_flag="-o out/conftest2.$ac_objext"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [^ ]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&5)
-   (eval "$lt_compile" 2>out/conftest.err)
-   ac_status=$?
-   cat out/conftest.err >&5
-   echo "$as_me:$LINENO: \$? = $ac_status" >&5
-   if (exit $ac_status) && test -s out/conftest2.$ac_objext
-   then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' > out/conftest.exp
-     $SED '/^$/d; /^ *+/d' out/conftest.err >out/conftest.er2
-     if test ! -s out/conftest.er2 || diff out/conftest.exp out/conftest.er2 >/dev/null; then
-       lt_cv_prog_compiler_c_o=yes
-     fi
-   fi
-   chmod u+w . 2>&5
-   $RM conftest*
-   # SGI C++ compiler will create directory out/ii_files/ for
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-   test -d out/ii_files && $RM out/ii_files/* && rmdir out/ii_files
-   $RM out/* && rmdir out
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-   $RM -r conftest
-   $RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_c_o" >&5
-$as_echo "$lt_cv_prog_compiler_c_o" >&6; }
-
-
-
-
-hard_links="nottested"
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-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if we can lock with hard links" >&5
-$as_echo_n "checking if we can lock with hard links... " >&6; }
-  hard_links=yes
-  $RM conftest*
-  ln conftest.a conftest.b 2>/dev/null && hard_links=no
-  touch conftest.a
-  ln conftest.a conftest.b 2>&5 || hard_links=no
-  ln conftest.a conftest.b 2>/dev/null && hard_links=no
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $hard_links" >&5
-$as_echo "$hard_links" >&6; }
-  if test "$hard_links" = no; then
-    { $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: \`$CC' does not support \`-c -o', so \`make -j' may be unsafe" >&5
-$as_echo "$as_me: WARNING: \`$CC' does not support \`-c -o', so \`make -j' may be unsafe" >&2;}
-    need_locks=warn
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-else
-  need_locks=no
-fi
-
-
-
-
-
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether the $compiler linker ($LD) supports shared libraries" >&5
-$as_echo_n "checking whether the $compiler linker ($LD) supports shared libraries... " >&6; }
-
-  runpath_var=
-  allow_undefined_flag=
-  always_export_symbols=no
-  archive_cmds=
-  archive_expsym_cmds=
-  compiler_needs_object=no
-  enable_shared_with_static_runtimes=no
-  export_dynamic_flag_spec=
-  export_symbols_cmds='$NM $libobjs $convenience | $global_symbol_pipe | $SED '\''s/.* //'\'' | sort | uniq > $export_symbols'
-  hardcode_automatic=no
-  hardcode_direct=no
-  hardcode_direct_absolute=no
-  hardcode_libdir_flag_spec=
-  hardcode_libdir_separator=
-  hardcode_minus_L=no
-  hardcode_shlibpath_var=unsupported
-  inherit_rpath=no
-  link_all_deplibs=unknown
-  module_cmds=
-  module_expsym_cmds=
-  old_archive_from_new_cmds=
-  old_archive_from_expsyms_cmds=
-  thread_safe_flag_spec=
-  whole_archive_flag_spec=
-  # include_expsyms should be a list of space-separated symbols to be *always*
-  # included in the symbol list
-  include_expsyms=
-  # exclude_expsyms can be an extended regexp of symbols to exclude
-  # it will be wrapped by ` (' and `)$', so one must not match beginning or
-  # end of line.  Example: `a|bc|.*d.*' will exclude the symbols `a' and `bc',
-  # as well as any symbol that contains `d'.
-  exclude_expsyms='_GLOBAL_OFFSET_TABLE_|_GLOBAL__F[ID]_.*'
-  # Although _GLOBAL_OFFSET_TABLE_ is a valid symbol C name, most a.out
-  # platforms (ab)use it in PIC code, but their linkers get confused if
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-  extract_expsyms_cmds=
-
-  case $host_os in
-  cygwin* | mingw* | pw32* | cegcc*)
-    # FIXME: the MSVC++ port hasn't been tested in a loooong time
-    # When not using gcc, we currently assume that we are using
-    # Microsoft Visual C++.
-    if test "$GCC" != yes; then
-      with_gnu_ld=no
-    fi
-    ;;
-  interix*)
-    # we just hope/assume this is gcc and not c89 (= MSVC++)
-    with_gnu_ld=yes
-    ;;
-  openbsd*)
-    with_gnu_ld=no
-    ;;
-  esac
-
-  ld_shlibs=yes
-
-  # On some targets, GNU ld is compatible enough with the native linker
-  # that we're better off using the native interface for both.
-  lt_use_gnu_ld_interface=no
-  if test "$with_gnu_ld" = yes; then
-    case $host_os in
-      aix*)
-	# The AIX port of GNU ld has always aspired to compatibility
-	# with the native linker.  However, as the warning in the GNU ld
-	# block says, versions before 2.19.5* couldn't really create working
-	# shared libraries, regardless of the interface used.
-	case `$LD -v 2>&1` in
-	  *\ \(GNU\ Binutils\)\ 2.19.5*) ;;
-	  *\ \(GNU\ Binutils\)\ 2.[2-9]*) ;;
-	  *\ \(GNU\ Binutils\)\ [3-9]*) ;;
-	  *)
-	    lt_use_gnu_ld_interface=yes
-	    ;;
-	esac
-	;;
-      *)
-	lt_use_gnu_ld_interface=yes
-	;;
-    esac
-  fi
-
-  if test "$lt_use_gnu_ld_interface" = yes; then
-    # If archive_cmds runs LD, not CC, wlarc should be empty
-    wlarc='${wl}'
-
-    # Set some defaults for GNU ld with shared library support. These
-    # are reset later if shared libraries are not supported. Putting them
-    # here allows them to be overridden if necessary.
-    runpath_var=LD_RUN_PATH
-    hardcode_libdir_flag_spec='${wl}-rpath ${wl}$libdir'
-    export_dynamic_flag_spec='${wl}--export-dynamic'
-    # ancient GNU ld didn't support --whole-archive et. al.
-    if $LD --help 2>&1 | $GREP 'no-whole-archive' > /dev/null; then
-      whole_archive_flag_spec="$wlarc"'--whole-archive$convenience '"$wlarc"'--no-whole-archive'
-    else
-      whole_archive_flag_spec=
-    fi
-    supports_anon_versioning=no
-    case `$LD -v 2>&1` in
-      *GNU\ gold*) supports_anon_versioning=yes ;;
-      *\ [01].* | *\ 2.[0-9].* | *\ 2.10.*) ;; # catch versions < 2.11
-      *\ 2.11.93.0.2\ *) supports_anon_versioning=yes ;; # RH7.3 ...
-      *\ 2.11.92.0.12\ *) supports_anon_versioning=yes ;; # Mandrake 8.2 ...
-      *\ 2.11.*) ;; # other 2.11 versions
-      *) supports_anon_versioning=yes ;;
-    esac
-
-    # See if GNU ld supports shared libraries.
-    case $host_os in
-    aix[3-9]*)
-      # On AIX/PPC, the GNU linker is very broken
-      if test "$host_cpu" != ia64; then
-	ld_shlibs=no
-	cat <<_LT_EOF 1>&2
-
-*** Warning: the GNU linker, at least up to release 2.19, is reported
-*** to be unable to reliably create shared libraries on AIX.
-*** Therefore, libtool is disabling shared libraries support.  If you
-*** really care for shared libraries, you may want to install binutils
-*** 2.20 or above, or modify your PATH so that a non-GNU linker is found.
-*** You will then need to restart the configuration process.
-
-_LT_EOF
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            archive_cmds='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-            archive_expsym_cmds=''
-        ;;
-      m68k)
-            archive_cmds='$RM $output_objdir/a2ixlibrary.data~$ECHO "#define NAME $libname" > $output_objdir/a2ixlibrary.data~$ECHO "#define LIBRARY_ID 1" >> $output_objdir/a2ixlibrary.data~$ECHO "#define VERSION $major" >> $output_objdir/a2ixlibrary.data~$ECHO "#define REVISION $revision" >> $output_objdir/a2ixlibrary.data~$AR $AR_FLAGS $lib $libobjs~$RANLIB $lib~(cd $output_objdir && a2ixlibrary -32)'
-            hardcode_libdir_flag_spec='-L$libdir'
-            hardcode_minus_L=yes
-        ;;
-      esac
-      ;;
-
-    beos*)
-      if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	allow_undefined_flag=unsupported
-	# Joseph Beckenbach <jrb3@best.com> says some releases of gcc
-	# support --undefined.  This deserves some investigation.  FIXME
-	archive_cmds='$CC -nostart $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-      else
-	ld_shlibs=no
-      fi
-      ;;
-
-    cygwin* | mingw* | pw32* | cegcc*)
-      # _LT_TAGVAR(hardcode_libdir_flag_spec, ) is actually meaningless,
-      # as there is no search path for DLLs.
-      hardcode_libdir_flag_spec='-L$libdir'
-      export_dynamic_flag_spec='${wl}--export-all-symbols'
-      allow_undefined_flag=unsupported
-      always_export_symbols=no
-      enable_shared_with_static_runtimes=yes
-      export_symbols_cmds='$NM $libobjs $convenience | $global_symbol_pipe | $SED -e '\''/^[BCDGRS][ ]/s/.*[ ]\([^ ]*\)/\1 DATA/;s/^.*[ ]__nm__\([^ ]*\)[ ][^ ]*/\1 DATA/;/^I[ ]/d;/^[AITW][ ]/s/.* //'\'' | sort | uniq > $export_symbols'
-      exclude_expsyms='[_]+GLOBAL_OFFSET_TABLE_|[_]+GLOBAL__[FID]_.*|[_]+head_[A-Za-z0-9_]+_dll|[A-Za-z0-9_]+_dll_iname'
-
-      if $LD --help 2>&1 | $GREP 'auto-import' > /dev/null; then
-        archive_cmds='$CC -shared $libobjs $deplibs $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-	# If the export-symbols file already is a .def file (1st line
-	# is EXPORTS), use it as is; otherwise, prepend...
-	archive_expsym_cmds='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	  cp $export_symbols $output_objdir/$soname.def;
-	else
-	  echo EXPORTS > $output_objdir/$soname.def;
-	  cat $export_symbols >> $output_objdir/$soname.def;
-	fi~
-	$CC -shared $output_objdir/$soname.def $libobjs $deplibs $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-      else
-	ld_shlibs=no
-      fi
-      ;;
-
-    haiku*)
-      archive_cmds='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-      link_all_deplibs=yes
-      ;;
-
-    interix[3-9]*)
-      hardcode_direct=no
-      hardcode_shlibpath_var=no
-      hardcode_libdir_flag_spec='${wl}-rpath,$libdir'
-      export_dynamic_flag_spec='${wl}-E'
-      # Hack: On Interix 3.x, we cannot compile PIC because of a broken gcc.
-      # Instead, shared libraries are loaded at an image base (0x10000000 by
-      # default) and relocated if they conflict, which is a slow very memory
-      # consuming and fragmenting process.  To avoid this, we pick a random,
-      # 256 KiB-aligned image base between 0x50000000 and 0x6FFC0000 at link
-      # time.  Moving up from 0x10000000 also allows more sbrk(2) space.
-      archive_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-      archive_expsym_cmds='sed "s,^,_," $export_symbols >$output_objdir/$soname.expsym~$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--retain-symbols-file,$output_objdir/$soname.expsym ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-      ;;
-
-    gnu* | linux* | tpf* | k*bsd*-gnu | kopensolaris*-gnu)
-      tmp_diet=no
-      if test "$host_os" = linux-dietlibc; then
-	case $cc_basename in
-	  diet\ *) tmp_diet=yes;;	# linux-dietlibc with static linking (!diet-dyn)
-	esac
-      fi
-      if $LD --help 2>&1 | $EGREP ': supported targets:.* elf' > /dev/null \
-	 && test "$tmp_diet" = no
-      then
-	tmp_addflag=' $pic_flag'
-	tmp_sharedflag='-shared'
-	case $cc_basename,$host_cpu in
-        pgcc*)				# Portland Group C compiler
-	  whole_archive_flag_spec='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  tmp_addflag=' $pic_flag'
-	  ;;
-	pgf77* | pgf90* | pgf95* | pgfortran*)
-					# Portland Group f77 and f90 compilers
-	  whole_archive_flag_spec='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  tmp_addflag=' $pic_flag -Mnomain' ;;
-	ecc*,ia64* | icc*,ia64*)	# Intel C compiler on ia64
-	  tmp_addflag=' -i_dynamic' ;;
-	efc*,ia64* | ifort*,ia64*)	# Intel Fortran compiler on ia64
-	  tmp_addflag=' -i_dynamic -nofor_main' ;;
-	ifc* | ifort*)			# Intel Fortran compiler
-	  tmp_addflag=' -nofor_main' ;;
-	lf95*)				# Lahey Fortran 8.1
-	  whole_archive_flag_spec=
-	  tmp_sharedflag='--shared' ;;
-	xl[cC]* | bgxl[cC]* | mpixl[cC]*) # IBM XL C 8.0 on PPC (deal with xlf below)
-	  tmp_sharedflag='-qmkshrobj'
-	  tmp_addflag= ;;
-	nvcc*)	# Cuda Compiler Driver 2.2
-	  whole_archive_flag_spec='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  compiler_needs_object=yes
-	  ;;
-	esac
-	case `$CC -V 2>&1 | sed 5q` in
-	*Sun\ C*)			# Sun C 5.9
-	  whole_archive_flag_spec='${wl}--whole-archive`new_convenience=; for conv in $convenience\"\"; do test -z \"$conv\" || new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  compiler_needs_object=yes
-	  tmp_sharedflag='-G' ;;
-	*Sun\ F*)			# Sun Fortran 8.3
-	  tmp_sharedflag='-G' ;;
-	esac
-	archive_cmds='$CC '"$tmp_sharedflag""$tmp_addflag"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-
-        if test "x$supports_anon_versioning" = xyes; then
-          archive_expsym_cmds='echo "{ global:" > $output_objdir/$libname.ver~
-	    cat $export_symbols | sed -e "s/\(.*\)/\1;/" >> $output_objdir/$libname.ver~
-	    echo "local: *; };" >> $output_objdir/$libname.ver~
-	    $CC '"$tmp_sharedflag""$tmp_addflag"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-version-script ${wl}$output_objdir/$libname.ver -o $lib'
-        fi
-
-	case $cc_basename in
-	xlf* | bgf* | bgxlf* | mpixlf*)
-	  # IBM XL Fortran 10.1 on PPC cannot create shared libs itself
-	  whole_archive_flag_spec='--whole-archive$convenience --no-whole-archive'
-	  hardcode_libdir_flag_spec='${wl}-rpath ${wl}$libdir'
-	  archive_cmds='$LD -shared $libobjs $deplibs $linker_flags -soname $soname -o $lib'
-	  if test "x$supports_anon_versioning" = xyes; then
-	    archive_expsym_cmds='echo "{ global:" > $output_objdir/$libname.ver~
-	      cat $export_symbols | sed -e "s/\(.*\)/\1;/" >> $output_objdir/$libname.ver~
-	      echo "local: *; };" >> $output_objdir/$libname.ver~
-	      $LD -shared $libobjs $deplibs $linker_flags -soname $soname -version-script $output_objdir/$libname.ver -o $lib'
-	  fi
-	  ;;
-	esac
-      else
-        ld_shlibs=no
-      fi
-      ;;
-
-    netbsd*)
-      if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-	archive_cmds='$LD -Bshareable $libobjs $deplibs $linker_flags -o $lib'
-	wlarc=
-      else
-	archive_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	archive_expsym_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-      fi
-      ;;
-
-    solaris*)
-      if $LD -v 2>&1 | $GREP 'BFD 2\.8' > /dev/null; then
-	ld_shlibs=no
-	cat <<_LT_EOF 1>&2
-
-*** Warning: The releases 2.8.* of the GNU linker cannot reliably
-*** create shared libraries on Solaris systems.  Therefore, libtool
-*** is disabling shared libraries support.  We urge you to upgrade GNU
-*** binutils to release 2.9.1 or newer.  Another option is to modify
-*** your PATH or compiler configuration so that the native linker is
-*** used, and then restart.
-
-_LT_EOF
-      elif $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	archive_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	archive_expsym_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-      else
-	ld_shlibs=no
-      fi
-      ;;
-
-    sysv5* | sco3.2v5* | sco5v6* | unixware* | OpenUNIX*)
-      case `$LD -v 2>&1` in
-        *\ [01].* | *\ 2.[0-9].* | *\ 2.1[0-5].*)
-	ld_shlibs=no
-	cat <<_LT_EOF 1>&2
-
-*** Warning: Releases of the GNU linker prior to 2.16.91.0.3 can not
-*** reliably create shared libraries on SCO systems.  Therefore, libtool
-*** is disabling shared libraries support.  We urge you to upgrade GNU
-*** binutils to release 2.16.91.0.3 or newer.  Another option is to modify
-*** your PATH or compiler configuration so that the native linker is
-*** used, and then restart.
-
-_LT_EOF
-	;;
-	*)
-	  # For security reasons, it is highly recommended that you always
-	  # use absolute paths for naming shared libraries, and exclude the
-	  # DT_RUNPATH tag from executables and libraries.  But doing so
-	  # requires that you compile everything twice, which is a pain.
-	  if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	    hardcode_libdir_flag_spec='${wl}-rpath ${wl}$libdir'
-	    archive_cmds='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	    archive_expsym_cmds='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-	  else
-	    ld_shlibs=no
-	  fi
-	;;
-      esac
-      ;;
-
-    sunos4*)
-      archive_cmds='$LD -assert pure-text -Bshareable -o $lib $libobjs $deplibs $linker_flags'
-      wlarc=
-      hardcode_direct=yes
-      hardcode_shlibpath_var=no
-      ;;
-
-    *)
-      if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	archive_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	archive_expsym_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-      else
-	ld_shlibs=no
-      fi
-      ;;
-    esac
-
-    if test "$ld_shlibs" = no; then
-      runpath_var=
-      hardcode_libdir_flag_spec=
-      export_dynamic_flag_spec=
-      whole_archive_flag_spec=
-    fi
-  else
-    # PORTME fill in a description of your system's linker (not GNU ld)
-    case $host_os in
-    aix3*)
-      allow_undefined_flag=unsupported
-      always_export_symbols=yes
-      archive_expsym_cmds='$LD -o $output_objdir/$soname $libobjs $deplibs $linker_flags -bE:$export_symbols -T512 -H512 -bM:SRE~$AR $AR_FLAGS $lib $output_objdir/$soname'
-      # Note: this linker hardcodes the directories in LIBPATH if there
-      # are no directories specified by -L.
-      hardcode_minus_L=yes
-      if test "$GCC" = yes && test -z "$lt_prog_compiler_static"; then
-	# Neither direct hardcoding nor static linking is supported with a
-	# broken collect2.
-	hardcode_direct=unsupported
-      fi
-      ;;
-
-    aix[4-9]*)
-      if test "$host_cpu" = ia64; then
-	# On IA64, the linker does run time linking by default, so we don't
-	# have to do anything special.
-	aix_use_runtimelinking=no
-	exp_sym_flag='-Bexport'
-	no_entry_flag=""
-      else
-	# If we're using GNU nm, then we don't want the "-C" option.
-	# -C means demangle to AIX nm, but means don't demangle with GNU nm
-	# Also, AIX nm treats weak defined symbols like other global
-	# defined symbols, whereas GNU nm marks them as "W".
-	if $NM -V 2>&1 | $GREP 'GNU' > /dev/null; then
-	  export_symbols_cmds='$NM -Bpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B") || (\$ 2 == "W")) && (substr(\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-	else
-	  export_symbols_cmds='$NM -BCpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B")) && (substr(\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-	fi
-	aix_use_runtimelinking=no
-
-	# Test if we are trying to use run time linking or normal
-	# AIX style linking. If -brtl is somewhere in LDFLAGS, we
-	# need to do runtime linking.
-	case $host_os in aix4.[23]|aix4.[23].*|aix[5-9]*)
-	  for ld_flag in $LDFLAGS; do
-	  if (test $ld_flag = "-brtl" || test $ld_flag = "-Wl,-brtl"); then
-	    aix_use_runtimelinking=yes
-	    break
-	  fi
-	  done
-	  ;;
-	esac
-
-	exp_sym_flag='-bexport'
-	no_entry_flag='-bnoentry'
-      fi
-
-      # When large executables or shared objects are built, AIX ld can
-      # have problems creating the table of contents.  If linking a library
-      # or program results in "error TOC overflow" add -mminimal-toc to
-      # CXXFLAGS/CFLAGS for g++/gcc.  In the cases where that is not
-      # enough to fix the problem, add -Wl,-bbigtoc to LDFLAGS.
-
-      archive_cmds=''
-      hardcode_direct=yes
-      hardcode_direct_absolute=yes
-      hardcode_libdir_separator=':'
-      link_all_deplibs=yes
-      file_list_spec='${wl}-f,'
-
-      if test "$GCC" = yes; then
-	case $host_os in aix4.[012]|aix4.[012].*)
-	# We only want to do this on AIX 4.2 and lower, the check
-	# below for broken collect2 doesn't work under 4.3+
-	  collect2name=`${CC} -print-prog-name=collect2`
-	  if test -f "$collect2name" &&
-	   strings "$collect2name" | $GREP resolve_lib_name >/dev/null
-	  then
-	  # We have reworked collect2
-	  :
-	  else
-	  # We have old collect2
-	  hardcode_direct=unsupported
-	  # It fails to find uninstalled libraries when the uninstalled
-	  # path is not listed in the libpath.  Setting hardcode_minus_L
-	  # to unsupported forces relinking
-	  hardcode_minus_L=yes
-	  hardcode_libdir_flag_spec='-L$libdir'
-	  hardcode_libdir_separator=
-	  fi
-	  ;;
-	esac
-	shared_flag='-shared'
-	if test "$aix_use_runtimelinking" = yes; then
-	  shared_flag="$shared_flag "'${wl}-G'
-	fi
-      else
-	# not using gcc
-	if test "$host_cpu" = ia64; then
-	# VisualAge C++, Version 5.5 for AIX 5L for IA-64, Beta 3 Release
-	# chokes on -Wl,-G. The following line is correct:
-	  shared_flag='-G'
-	else
-	  if test "$aix_use_runtimelinking" = yes; then
-	    shared_flag='${wl}-G'
-	  else
-	    shared_flag='${wl}-bM:SRE'
-	  fi
-	fi
-      fi
-
-      export_dynamic_flag_spec='${wl}-bexpall'
-      # It seems that -bexpall does not export symbols beginning with
-      # underscore (_), so it is better to generate a list of symbols to export.
-      always_export_symbols=yes
-      if test "$aix_use_runtimelinking" = yes; then
-	# Warning - without using the other runtime loading flags (-brtl),
-	# -berok will link without error, but may produce a broken library.
-	allow_undefined_flag='-berok'
-        # Determine the default libpath from the value encoded in an
-        # empty executable.
-        if test "${lt_cv_aix_libpath+set}" = set; then
-  aix_libpath=$lt_cv_aix_libpath
-else
-  if test "${lt_cv_aix_libpath_+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-
-  lt_aix_libpath_sed='
-      /Import File Strings/,/^$/ {
-	  /^0/ {
-	      s/^0  *\([^ ]*\) *$/\1/
-	      p
-	  }
-      }'
-  lt_cv_aix_libpath_=`dump -H conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  # Check for a 64-bit object if we didn't find anything.
-  if test -z "$lt_cv_aix_libpath_"; then
-    lt_cv_aix_libpath_=`dump -HX64 conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  fi
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-  if test -z "$lt_cv_aix_libpath_"; then
-    lt_cv_aix_libpath_="/usr/lib:/lib"
-  fi
-
-fi
-
-  aix_libpath=$lt_cv_aix_libpath_
-fi
-
-        hardcode_libdir_flag_spec='${wl}-blibpath:$libdir:'"$aix_libpath"
-        archive_expsym_cmds='$CC -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags `if test "x${allow_undefined_flag}" != "x"; then func_echo_all "${wl}${allow_undefined_flag}"; else :; fi` '"\${wl}$exp_sym_flag:\$export_symbols $shared_flag"
-      else
-	if test "$host_cpu" = ia64; then
-	  hardcode_libdir_flag_spec='${wl}-R $libdir:/usr/lib:/lib'
-	  allow_undefined_flag="-z nodefs"
-	  archive_expsym_cmds="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags ${wl}${allow_undefined_flag} '"\${wl}$exp_sym_flag:\$export_symbols"
-	else
-	 # Determine the default libpath from the value encoded in an
-	 # empty executable.
-	 if test "${lt_cv_aix_libpath+set}" = set; then
-  aix_libpath=$lt_cv_aix_libpath
-else
-  if test "${lt_cv_aix_libpath_+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-
-  lt_aix_libpath_sed='
-      /Import File Strings/,/^$/ {
-	  /^0/ {
-	      s/^0  *\([^ ]*\) *$/\1/
-	      p
-	  }
-      }'
-  lt_cv_aix_libpath_=`dump -H conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  # Check for a 64-bit object if we didn't find anything.
-  if test -z "$lt_cv_aix_libpath_"; then
-    lt_cv_aix_libpath_=`dump -HX64 conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  fi
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-  if test -z "$lt_cv_aix_libpath_"; then
-    lt_cv_aix_libpath_="/usr/lib:/lib"
-  fi
-
-fi
-
-  aix_libpath=$lt_cv_aix_libpath_
-fi
-
-	 hardcode_libdir_flag_spec='${wl}-blibpath:$libdir:'"$aix_libpath"
-	  # Warning - without using the other run time loading flags,
-	  # -berok will link without error, but may produce a broken library.
-	  no_undefined_flag=' ${wl}-bernotok'
-	  allow_undefined_flag=' ${wl}-berok'
-	  if test "$with_gnu_ld" = yes; then
-	    # We only use this code for GNU lds that support --whole-archive.
-	    whole_archive_flag_spec='${wl}--whole-archive$convenience ${wl}--no-whole-archive'
-	  else
-	    # Exported symbols can be pulled into shared objects from archives
-	    whole_archive_flag_spec='$convenience'
-	  fi
-	  archive_cmds_need_lc=yes
-	  # This is similar to how AIX traditionally builds its shared libraries.
-	  archive_expsym_cmds="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs ${wl}-bnoentry $compiler_flags ${wl}-bE:$export_symbols${allow_undefined_flag}~$AR $AR_FLAGS $output_objdir/$libname$release.a $output_objdir/$soname'
-	fi
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            archive_cmds='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-            archive_expsym_cmds=''
-        ;;
-      m68k)
-            archive_cmds='$RM $output_objdir/a2ixlibrary.data~$ECHO "#define NAME $libname" > $output_objdir/a2ixlibrary.data~$ECHO "#define LIBRARY_ID 1" >> $output_objdir/a2ixlibrary.data~$ECHO "#define VERSION $major" >> $output_objdir/a2ixlibrary.data~$ECHO "#define REVISION $revision" >> $output_objdir/a2ixlibrary.data~$AR $AR_FLAGS $lib $libobjs~$RANLIB $lib~(cd $output_objdir && a2ixlibrary -32)'
-            hardcode_libdir_flag_spec='-L$libdir'
-            hardcode_minus_L=yes
-        ;;
-      esac
-      ;;
-
-    bsdi[45]*)
-      export_dynamic_flag_spec=-rdynamic
-      ;;
-
-    cygwin* | mingw* | pw32* | cegcc*)
-      # When not using gcc, we currently assume that we are using
-      # Microsoft Visual C++.
-      # hardcode_libdir_flag_spec is actually meaningless, as there is
-      # no search path for DLLs.
-      case $cc_basename in
-      cl*)
-	# Native MSVC
-	hardcode_libdir_flag_spec=' '
-	allow_undefined_flag=unsupported
-	always_export_symbols=yes
-	file_list_spec='@'
-	# Tell ltmain to make .lib files, not .a files.
-	libext=lib
-	# Tell ltmain to make .dll files, not .so files.
-	shrext_cmds=".dll"
-	# FIXME: Setting linknames here is a bad hack.
-	archive_cmds='$CC -o $output_objdir/$soname $libobjs $compiler_flags $deplibs -Wl,-dll~linknames='
-	archive_expsym_cmds='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	    sed -n -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' -e '1\\\!p' < $export_symbols > $output_objdir/$soname.exp;
-	  else
-	    sed -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' < $export_symbols > $output_objdir/$soname.exp;
-	  fi~
-	  $CC -o $tool_output_objdir$soname $libobjs $compiler_flags $deplibs "@$tool_output_objdir$soname.exp" -Wl,-DLL,-IMPLIB:"$tool_output_objdir$libname.dll.lib"~
-	  linknames='
-	# The linker will not automatically build a static lib if we build a DLL.
-	# _LT_TAGVAR(old_archive_from_new_cmds, )='true'
-	enable_shared_with_static_runtimes=yes
-	exclude_expsyms='_NULL_IMPORT_DESCRIPTOR|_IMPORT_DESCRIPTOR_.*'
-	export_symbols_cmds='$NM $libobjs $convenience | $global_symbol_pipe | $SED -e '\''/^[BCDGRS][ ]/s/.*[ ]\([^ ]*\)/\1,DATA/'\'' | $SED -e '\''/^[AITW][ ]/s/.*[ ]//'\'' | sort | uniq > $export_symbols'
-	# Don't use ranlib
-	old_postinstall_cmds='chmod 644 $oldlib'
-	postlink_cmds='lt_outputfile="@OUTPUT@"~
-	  lt_tool_outputfile="@TOOL_OUTPUT@"~
-	  case $lt_outputfile in
-	    *.exe|*.EXE) ;;
-	    *)
-	      lt_outputfile="$lt_outputfile.exe"
-	      lt_tool_outputfile="$lt_tool_outputfile.exe"
-	      ;;
-	  esac~
-	  if test "$MANIFEST_TOOL" != ":" && test -f "$lt_outputfile.manifest"; then
-	    $MANIFEST_TOOL -manifest "$lt_tool_outputfile.manifest" -outputresource:"$lt_tool_outputfile" || exit 1;
-	    $RM "$lt_outputfile.manifest";
-	  fi'
-	;;
-      *)
-	# Assume MSVC wrapper
-	hardcode_libdir_flag_spec=' '
-	allow_undefined_flag=unsupported
-	# Tell ltmain to make .lib files, not .a files.
-	libext=lib
-	# Tell ltmain to make .dll files, not .so files.
-	shrext_cmds=".dll"
-	# FIXME: Setting linknames here is a bad hack.
-	archive_cmds='$CC -o $lib $libobjs $compiler_flags `func_echo_all "$deplibs" | $SED '\''s/ -lc$//'\''` -link -dll~linknames='
-	# The linker will automatically build a .lib file if we build a DLL.
-	old_archive_from_new_cmds='true'
-	# FIXME: Should let the user specify the lib program.
-	old_archive_cmds='lib -OUT:$oldlib$oldobjs$old_deplibs'
-	enable_shared_with_static_runtimes=yes
-	;;
-      esac
-      ;;
-
-    darwin* | rhapsody*)
-
-
-  archive_cmds_need_lc=no
-  hardcode_direct=no
-  hardcode_automatic=yes
-  hardcode_shlibpath_var=unsupported
-  if test "$lt_cv_ld_force_load" = "yes"; then
-    whole_archive_flag_spec='`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience ${wl}-force_load,$conv\"; done; func_echo_all \"$new_convenience\"`'
-
-  else
-    whole_archive_flag_spec=''
-  fi
-  link_all_deplibs=yes
-  allow_undefined_flag="$_lt_dar_allow_undefined"
-  case $cc_basename in
-     ifort*) _lt_dar_can_shared=yes ;;
-     *) _lt_dar_can_shared=$GCC ;;
-  esac
-  if test "$_lt_dar_can_shared" = "yes"; then
-    output_verbose_link_cmd=func_echo_all
-    archive_cmds="\$CC -dynamiclib \$allow_undefined_flag -o \$lib \$libobjs \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring $_lt_dar_single_mod${_lt_dsymutil}"
-    module_cmds="\$CC \$allow_undefined_flag -o \$lib -bundle \$libobjs \$deplibs \$compiler_flags${_lt_dsymutil}"
-    archive_expsym_cmds="sed 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC -dynamiclib \$allow_undefined_flag -o \$lib \$libobjs \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring ${_lt_dar_single_mod}${_lt_dar_export_syms}${_lt_dsymutil}"
-    module_expsym_cmds="sed -e 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC \$allow_undefined_flag -o \$lib -bundle \$libobjs \$deplibs \$compiler_flags${_lt_dar_export_syms}${_lt_dsymutil}"
-
-  else
-  ld_shlibs=no
-  fi
-
-      ;;
-
-    dgux*)
-      archive_cmds='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      hardcode_libdir_flag_spec='-L$libdir'
-      hardcode_shlibpath_var=no
-      ;;
-
-    # FreeBSD 2.2.[012] allows us to include c++rt0.o to get C++ constructor
-    # support.  Future versions do this automatically, but an explicit c++rt0.o
-    # does not break anything, and helps significantly (at the cost of a little
-    # extra space).
-    freebsd2.2*)
-      archive_cmds='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags /usr/lib/c++rt0.o'
-      hardcode_libdir_flag_spec='-R$libdir'
-      hardcode_direct=yes
-      hardcode_shlibpath_var=no
-      ;;
-
-    # Unfortunately, older versions of FreeBSD 2 do not have this feature.
-    freebsd2.*)
-      archive_cmds='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags'
-      hardcode_direct=yes
-      hardcode_minus_L=yes
-      hardcode_shlibpath_var=no
-      ;;
-
-    # FreeBSD 3 and greater uses gcc -shared to do shared libraries.
-    freebsd* | dragonfly*)
-      archive_cmds='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags'
-      hardcode_libdir_flag_spec='-R$libdir'
-      hardcode_direct=yes
-      hardcode_shlibpath_var=no
-      ;;
-
-    hpux9*)
-      if test "$GCC" = yes; then
-	archive_cmds='$RM $output_objdir/$soname~$CC -shared $pic_flag ${wl}+b ${wl}$install_libdir -o $output_objdir/$soname $libobjs $deplibs $compiler_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-      else
-	archive_cmds='$RM $output_objdir/$soname~$LD -b +b $install_libdir -o $output_objdir/$soname $libobjs $deplibs $linker_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-      fi
-      hardcode_libdir_flag_spec='${wl}+b ${wl}$libdir'
-      hardcode_libdir_separator=:
-      hardcode_direct=yes
-
-      # hardcode_minus_L: Not really in the search PATH,
-      # but as the default location of the library.
-      hardcode_minus_L=yes
-      export_dynamic_flag_spec='${wl}-E'
-      ;;
-
-    hpux10*)
-      if test "$GCC" = yes && test "$with_gnu_ld" = no; then
-	archive_cmds='$CC -shared $pic_flag ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	archive_cmds='$LD -b +h $soname +b $install_libdir -o $lib $libobjs $deplibs $linker_flags'
-      fi
-      if test "$with_gnu_ld" = no; then
-	hardcode_libdir_flag_spec='${wl}+b ${wl}$libdir'
-	hardcode_libdir_separator=:
-	hardcode_direct=yes
-	hardcode_direct_absolute=yes
-	export_dynamic_flag_spec='${wl}-E'
-	# hardcode_minus_L: Not really in the search PATH,
-	# but as the default location of the library.
-	hardcode_minus_L=yes
-      fi
-      ;;
-
-    hpux11*)
-      if test "$GCC" = yes && test "$with_gnu_ld" = no; then
-	case $host_cpu in
-	hppa*64*)
-	  archive_cmds='$CC -shared ${wl}+h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	ia64*)
-	  archive_cmds='$CC -shared $pic_flag ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	*)
-	  archive_cmds='$CC -shared $pic_flag ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	esac
-      else
-	case $host_cpu in
-	hppa*64*)
-	  archive_cmds='$CC -b ${wl}+h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	ia64*)
-	  archive_cmds='$CC -b ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	*)
-
-	  # Older versions of the 11.00 compiler do not understand -b yet
-	  # (HP92453-01 A.11.01.20 doesn't, HP92453-01 B.11.X.35175-35176.GP does)
-	  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $CC understands -b" >&5
-$as_echo_n "checking if $CC understands -b... " >&6; }
-if test "${lt_cv_prog_compiler__b+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler__b=no
-   save_LDFLAGS="$LDFLAGS"
-   LDFLAGS="$LDFLAGS -b"
-   echo "$lt_simple_link_test_code" > conftest.$ac_ext
-   if (eval $ac_link 2>conftest.err) && test -s conftest$ac_exeext; then
-     # The linker can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     if test -s conftest.err; then
-       # Append any errors to the config.log.
-       cat conftest.err 1>&5
-       $ECHO "$_lt_linker_boilerplate" | $SED '/^$/d' > conftest.exp
-       $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-       if diff conftest.exp conftest.er2 >/dev/null; then
-         lt_cv_prog_compiler__b=yes
-       fi
-     else
-       lt_cv_prog_compiler__b=yes
-     fi
-   fi
-   $RM -r conftest*
-   LDFLAGS="$save_LDFLAGS"
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler__b" >&5
-$as_echo "$lt_cv_prog_compiler__b" >&6; }
-
-if test x"$lt_cv_prog_compiler__b" = xyes; then
-    archive_cmds='$CC -b ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $libobjs $deplibs $compiler_flags'
-else
-    archive_cmds='$LD -b +h $soname +b $install_libdir -o $lib $libobjs $deplibs $linker_flags'
-fi
-
-	  ;;
-	esac
-      fi
-      if test "$with_gnu_ld" = no; then
-	hardcode_libdir_flag_spec='${wl}+b ${wl}$libdir'
-	hardcode_libdir_separator=:
-
-	case $host_cpu in
-	hppa*64*|ia64*)
-	  hardcode_direct=no
-	  hardcode_shlibpath_var=no
-	  ;;
-	*)
-	  hardcode_direct=yes
-	  hardcode_direct_absolute=yes
-	  export_dynamic_flag_spec='${wl}-E'
-
-	  # hardcode_minus_L: Not really in the search PATH,
-	  # but as the default location of the library.
-	  hardcode_minus_L=yes
-	  ;;
-	esac
-      fi
-      ;;
-
-    irix5* | irix6* | nonstopux*)
-      if test "$GCC" = yes; then
-	archive_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-	# Try to use the -exported_symbol ld option, if it does not
-	# work, assume that -exports_file does not work either and
-	# implicitly export all symbols.
-	# This should be the same for all languages, so no per-tag cache variable.
-	{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether the $host_os linker accepts -exported_symbol" >&5
-$as_echo_n "checking whether the $host_os linker accepts -exported_symbol... " >&6; }
-if test "${lt_cv_irix_exported_symbol+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  save_LDFLAGS="$LDFLAGS"
-	   LDFLAGS="$LDFLAGS -shared ${wl}-exported_symbol ${wl}foo ${wl}-update_registry ${wl}/dev/null"
-	   cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-int foo (void) { return 0; }
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  lt_cv_irix_exported_symbol=yes
-else
-  lt_cv_irix_exported_symbol=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-           LDFLAGS="$save_LDFLAGS"
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_irix_exported_symbol" >&5
-$as_echo "$lt_cv_irix_exported_symbol" >&6; }
-	if test "$lt_cv_irix_exported_symbol" = yes; then
-          archive_expsym_cmds='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations ${wl}-exports_file ${wl}$export_symbols -o $lib'
-	fi
-      else
-	archive_cmds='$CC -shared $libobjs $deplibs $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	archive_expsym_cmds='$CC -shared $libobjs $deplibs $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -exports_file $export_symbols -o $lib'
-      fi
-      archive_cmds_need_lc='no'
-      hardcode_libdir_flag_spec='${wl}-rpath ${wl}$libdir'
-      hardcode_libdir_separator=:
-      inherit_rpath=yes
-      link_all_deplibs=yes
-      ;;
-
-    netbsd*)
-      if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-	archive_cmds='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags'  # a.out
-      else
-	archive_cmds='$LD -shared -o $lib $libobjs $deplibs $linker_flags'      # ELF
-      fi
-      hardcode_libdir_flag_spec='-R$libdir'
-      hardcode_direct=yes
-      hardcode_shlibpath_var=no
-      ;;
-
-    newsos6)
-      archive_cmds='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      hardcode_direct=yes
-      hardcode_libdir_flag_spec='${wl}-rpath ${wl}$libdir'
-      hardcode_libdir_separator=:
-      hardcode_shlibpath_var=no
-      ;;
-
-    *nto* | *qnx*)
-      ;;
-
-    openbsd*)
-      if test -f /usr/libexec/ld.so; then
-	hardcode_direct=yes
-	hardcode_shlibpath_var=no
-	hardcode_direct_absolute=yes
-	if test -z "`echo __ELF__ | $CC -E - | $GREP __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-	  archive_cmds='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags'
-	  archive_expsym_cmds='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags ${wl}-retain-symbols-file,$export_symbols'
-	  hardcode_libdir_flag_spec='${wl}-rpath,$libdir'
-	  export_dynamic_flag_spec='${wl}-E'
-	else
-	  case $host_os in
-	   openbsd[01].* | openbsd2.[0-7] | openbsd2.[0-7].*)
-	     archive_cmds='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags'
-	     hardcode_libdir_flag_spec='-R$libdir'
-	     ;;
-	   *)
-	     archive_cmds='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags'
-	     hardcode_libdir_flag_spec='${wl}-rpath,$libdir'
-	     ;;
-	  esac
-	fi
-      else
-	ld_shlibs=no
-      fi
-      ;;
-
-    os2*)
-      hardcode_libdir_flag_spec='-L$libdir'
-      hardcode_minus_L=yes
-      allow_undefined_flag=unsupported
-      archive_cmds='$ECHO "LIBRARY $libname INITINSTANCE" > $output_objdir/$libname.def~$ECHO "DESCRIPTION \"$libname\"" >> $output_objdir/$libname.def~echo DATA >> $output_objdir/$libname.def~echo " SINGLE NONSHARED" >> $output_objdir/$libname.def~echo EXPORTS >> $output_objdir/$libname.def~emxexp $libobjs >> $output_objdir/$libname.def~$CC -Zdll -Zcrtdll -o $lib $libobjs $deplibs $compiler_flags $output_objdir/$libname.def'
-      old_archive_from_new_cmds='emximp -o $output_objdir/$libname.a $output_objdir/$libname.def'
-      ;;
-
-    osf3*)
-      if test "$GCC" = yes; then
-	allow_undefined_flag=' ${wl}-expect_unresolved ${wl}\*'
-	archive_cmds='$CC -shared${allow_undefined_flag} $libobjs $deplibs $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-      else
-	allow_undefined_flag=' -expect_unresolved \*'
-	archive_cmds='$CC -shared${allow_undefined_flag} $libobjs $deplibs $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-      fi
-      archive_cmds_need_lc='no'
-      hardcode_libdir_flag_spec='${wl}-rpath ${wl}$libdir'
-      hardcode_libdir_separator=:
-      ;;
-
-    osf4* | osf5*)	# as osf3* with the addition of -msym flag
-      if test "$GCC" = yes; then
-	allow_undefined_flag=' ${wl}-expect_unresolved ${wl}\*'
-	archive_cmds='$CC -shared${allow_undefined_flag} $pic_flag $libobjs $deplibs $compiler_flags ${wl}-msym ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-	hardcode_libdir_flag_spec='${wl}-rpath ${wl}$libdir'
-      else
-	allow_undefined_flag=' -expect_unresolved \*'
-	archive_cmds='$CC -shared${allow_undefined_flag} $libobjs $deplibs $compiler_flags -msym -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	archive_expsym_cmds='for i in `cat $export_symbols`; do printf "%s %s\\n" -exported_symbol "\$i" >> $lib.exp; done; printf "%s\\n" "-hidden">> $lib.exp~
-	$CC -shared${allow_undefined_flag} ${wl}-input ${wl}$lib.exp $compiler_flags $libobjs $deplibs -soname $soname `test -n "$verstring" && $ECHO "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib~$RM $lib.exp'
-
-	# Both c and cxx compiler support -rpath directly
-	hardcode_libdir_flag_spec='-rpath $libdir'
-      fi
-      archive_cmds_need_lc='no'
-      hardcode_libdir_separator=:
-      ;;
-
-    solaris*)
-      no_undefined_flag=' -z defs'
-      if test "$GCC" = yes; then
-	wlarc='${wl}'
-	archive_cmds='$CC -shared $pic_flag ${wl}-z ${wl}text ${wl}-h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags'
-	archive_expsym_cmds='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	  $CC -shared $pic_flag ${wl}-z ${wl}text ${wl}-M ${wl}$lib.exp ${wl}-h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags~$RM $lib.exp'
-      else
-	case `$CC -V 2>&1` in
-	*"Compilers 5.0"*)
-	  wlarc=''
-	  archive_cmds='$LD -G${allow_undefined_flag} -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	  archive_expsym_cmds='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	  $LD -G${allow_undefined_flag} -M $lib.exp -h $soname -o $lib $libobjs $deplibs $linker_flags~$RM $lib.exp'
-	  ;;
-	*)
-	  wlarc='${wl}'
-	  archive_cmds='$CC -G${allow_undefined_flag} -h $soname -o $lib $libobjs $deplibs $compiler_flags'
-	  archive_expsym_cmds='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	  $CC -G${allow_undefined_flag} -M $lib.exp -h $soname -o $lib $libobjs $deplibs $compiler_flags~$RM $lib.exp'
-	  ;;
-	esac
-      fi
-      hardcode_libdir_flag_spec='-R$libdir'
-      hardcode_shlibpath_var=no
-      case $host_os in
-      solaris2.[0-5] | solaris2.[0-5].*) ;;
-      *)
-	# The compiler driver will combine and reorder linker options,
-	# but understands `-z linker_flag'.  GCC discards it without `$wl',
-	# but is careful enough not to reorder.
-	# Supported since Solaris 2.6 (maybe 2.5.1?)
-	if test "$GCC" = yes; then
-	  whole_archive_flag_spec='${wl}-z ${wl}allextract$convenience ${wl}-z ${wl}defaultextract'
-	else
-	  whole_archive_flag_spec='-z allextract$convenience -z defaultextract'
-	fi
-	;;
-      esac
-      link_all_deplibs=yes
-      ;;
-
-    sunos4*)
-      if test "x$host_vendor" = xsequent; then
-	# Use $CC to link under sequent, because it throws in some extra .o
-	# files that make .init and .fini sections work.
-	archive_cmds='$CC -G ${wl}-h $soname -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	archive_cmds='$LD -assert pure-text -Bstatic -o $lib $libobjs $deplibs $linker_flags'
-      fi
-      hardcode_libdir_flag_spec='-L$libdir'
-      hardcode_direct=yes
-      hardcode_minus_L=yes
-      hardcode_shlibpath_var=no
-      ;;
-
-    sysv4)
-      case $host_vendor in
-	sni)
-	  archive_cmds='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	  hardcode_direct=yes # is this really true???
-	;;
-	siemens)
-	  ## LD is ld it makes a PLAMLIB
-	  ## CC just makes a GrossModule.
-	  archive_cmds='$LD -G -o $lib $libobjs $deplibs $linker_flags'
-	  reload_cmds='$CC -r -o $output$reload_objs'
-	  hardcode_direct=no
-        ;;
-	motorola)
-	  archive_cmds='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	  hardcode_direct=no #Motorola manual says yes, but my tests say they lie
-	;;
-      esac
-      runpath_var='LD_RUN_PATH'
-      hardcode_shlibpath_var=no
-      ;;
-
-    sysv4.3*)
-      archive_cmds='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      hardcode_shlibpath_var=no
-      export_dynamic_flag_spec='-Bexport'
-      ;;
-
-    sysv4*MP*)
-      if test -d /usr/nec; then
-	archive_cmds='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	hardcode_shlibpath_var=no
-	runpath_var=LD_RUN_PATH
-	hardcode_runpath_var=yes
-	ld_shlibs=yes
-      fi
-      ;;
-
-    sysv4*uw2* | sysv5OpenUNIX* | sysv5UnixWare7.[01].[10]* | unixware7* | sco3.2v5.0.[024]*)
-      no_undefined_flag='${wl}-z,text'
-      archive_cmds_need_lc=no
-      hardcode_shlibpath_var=no
-      runpath_var='LD_RUN_PATH'
-
-      if test "$GCC" = yes; then
-	archive_cmds='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	archive_expsym_cmds='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	archive_cmds='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	archive_expsym_cmds='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      fi
-      ;;
-
-    sysv5* | sco3.2v5* | sco5v6*)
-      # Note: We can NOT use -z defs as we might desire, because we do not
-      # link with -lc, and that would cause any symbols used from libc to
-      # always be unresolved, which means just about no library would
-      # ever link correctly.  If we're not using GNU ld we use -z text
-      # though, which does catch some bad symbols but isn't as heavy-handed
-      # as -z defs.
-      no_undefined_flag='${wl}-z,text'
-      allow_undefined_flag='${wl}-z,nodefs'
-      archive_cmds_need_lc=no
-      hardcode_shlibpath_var=no
-      hardcode_libdir_flag_spec='${wl}-R,$libdir'
-      hardcode_libdir_separator=':'
-      link_all_deplibs=yes
-      export_dynamic_flag_spec='${wl}-Bexport'
-      runpath_var='LD_RUN_PATH'
-
-      if test "$GCC" = yes; then
-	archive_cmds='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	archive_expsym_cmds='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	archive_cmds='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	archive_expsym_cmds='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      fi
-      ;;
-
-    uts4*)
-      archive_cmds='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      hardcode_libdir_flag_spec='-L$libdir'
-      hardcode_shlibpath_var=no
-      ;;
-
-    *)
-      ld_shlibs=no
-      ;;
-    esac
-
-    if test x$host_vendor = xsni; then
-      case $host in
-      sysv4 | sysv4.2uw2* | sysv4.3* | sysv5*)
-	export_dynamic_flag_spec='${wl}-Blargedynsym'
-	;;
-      esac
-    fi
-  fi
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ld_shlibs" >&5
-$as_echo "$ld_shlibs" >&6; }
-test "$ld_shlibs" = no && can_build_shared=no
-
-with_gnu_ld=$with_gnu_ld
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-#
-# Do we need to explicitly link libc?
-#
-case "x$archive_cmds_need_lc" in
-x|xyes)
-  # Assume -lc should be added
-  archive_cmds_need_lc=yes
-
-  if test "$enable_shared" = yes && test "$GCC" = yes; then
-    case $archive_cmds in
-    *'~'*)
-      # FIXME: we may have to deal with multi-command sequences.
-      ;;
-    '$CC '*)
-      # Test whether the compiler implicitly links with -lc since on some
-      # systems, -lgcc has to come before -lc. If gcc already passes -lc
-      # to ld, don't add -lc before -lgcc.
-      { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether -lc should be explicitly linked in" >&5
-$as_echo_n "checking whether -lc should be explicitly linked in... " >&6; }
-if test "${lt_cv_archive_cmds_need_lc+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  $RM conftest*
-	echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-	if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; } 2>conftest.err; then
-	  soname=conftest
-	  lib=conftest
-	  libobjs=conftest.$ac_objext
-	  deplibs=
-	  wl=$lt_prog_compiler_wl
-	  pic_flag=$lt_prog_compiler_pic
-	  compiler_flags=-v
-	  linker_flags=-v
-	  verstring=
-	  output_objdir=.
-	  libname=conftest
-	  lt_save_allow_undefined_flag=$allow_undefined_flag
-	  allow_undefined_flag=
-	  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$archive_cmds 2\>\&1 \| $GREP \" -lc \" \>/dev/null 2\>\&1\""; } >&5
-  (eval $archive_cmds 2\>\&1 \| $GREP \" -lc \" \>/dev/null 2\>\&1) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }
-	  then
-	    lt_cv_archive_cmds_need_lc=no
-	  else
-	    lt_cv_archive_cmds_need_lc=yes
-	  fi
-	  allow_undefined_flag=$lt_save_allow_undefined_flag
-	else
-	  cat conftest.err 1>&5
-	fi
-	$RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_archive_cmds_need_lc" >&5
-$as_echo "$lt_cv_archive_cmds_need_lc" >&6; }
-      archive_cmds_need_lc=$lt_cv_archive_cmds_need_lc
-      ;;
-    esac
-  fi
-  ;;
-esac
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
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-
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-
-
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking dynamic linker characteristics" >&5
-$as_echo_n "checking dynamic linker characteristics... " >&6; }
-
-if test "$GCC" = yes; then
-  case $host_os in
-    darwin*) lt_awk_arg="/^libraries:/,/LR/" ;;
-    *) lt_awk_arg="/^libraries:/" ;;
-  esac
-  case $host_os in
-    mingw* | cegcc*) lt_sed_strip_eq="s,=\([A-Za-z]:\),\1,g" ;;
-    *) lt_sed_strip_eq="s,=/,/,g" ;;
-  esac
-  lt_search_path_spec=`$CC -print-search-dirs | awk $lt_awk_arg | $SED -e "s/^libraries://" -e $lt_sed_strip_eq`
-  case $lt_search_path_spec in
-  *\;*)
-    # if the path contains ";" then we assume it to be the separator
-    # otherwise default to the standard path separator (i.e. ":") - it is
-    # assumed that no part of a normal pathname contains ";" but that should
-    # okay in the real world where ";" in dirpaths is itself problematic.
-    lt_search_path_spec=`$ECHO "$lt_search_path_spec" | $SED 's/;/ /g'`
-    ;;
-  *)
-    lt_search_path_spec=`$ECHO "$lt_search_path_spec" | $SED "s/$PATH_SEPARATOR/ /g"`
-    ;;
-  esac
-  # Ok, now we have the path, separated by spaces, we can step through it
-  # and add multilib dir if necessary.
-  lt_tmp_lt_search_path_spec=
-  lt_multi_os_dir=`$CC $CPPFLAGS $CFLAGS $LDFLAGS -print-multi-os-directory 2>/dev/null`
-  for lt_sys_path in $lt_search_path_spec; do
-    if test -d "$lt_sys_path/$lt_multi_os_dir"; then
-      lt_tmp_lt_search_path_spec="$lt_tmp_lt_search_path_spec $lt_sys_path/$lt_multi_os_dir"
-    else
-      test -d "$lt_sys_path" && \
-	lt_tmp_lt_search_path_spec="$lt_tmp_lt_search_path_spec $lt_sys_path"
-    fi
-  done
-  lt_search_path_spec=`$ECHO "$lt_tmp_lt_search_path_spec" | awk '
-BEGIN {RS=" "; FS="/|\n";} {
-  lt_foo="";
-  lt_count=0;
-  for (lt_i = NF; lt_i > 0; lt_i--) {
-    if ($lt_i != "" && $lt_i != ".") {
-      if ($lt_i == "..") {
-        lt_count++;
-      } else {
-        if (lt_count == 0) {
-          lt_foo="/" $lt_i lt_foo;
-        } else {
-          lt_count--;
-        }
-      }
-    }
-  }
-  if (lt_foo != "") { lt_freq[lt_foo]++; }
-  if (lt_freq[lt_foo] == 1) { print lt_foo; }
-}'`
-  # AWK program above erroneously prepends '/' to C:/dos/paths
-  # for these hosts.
-  case $host_os in
-    mingw* | cegcc*) lt_search_path_spec=`$ECHO "$lt_search_path_spec" |\
-      $SED 's,/\([A-Za-z]:\),\1,g'` ;;
-  esac
-  sys_lib_search_path_spec=`$ECHO "$lt_search_path_spec" | $lt_NL2SP`
-else
-  sys_lib_search_path_spec="/lib /usr/lib /usr/local/lib"
-fi
-library_names_spec=
-libname_spec='lib$name'
-soname_spec=
-shrext_cmds=".so"
-postinstall_cmds=
-postuninstall_cmds=
-finish_cmds=
-finish_eval=
-shlibpath_var=
-shlibpath_overrides_runpath=unknown
-version_type=none
-dynamic_linker="$host_os ld.so"
-sys_lib_dlsearch_path_spec="/lib /usr/lib"
-need_lib_prefix=unknown
-hardcode_into_libs=no
-
-# when you set need_version to no, make sure it does not cause -set_version
-# flags to be left without arguments
-need_version=unknown
-
-case $host_os in
-aix3*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix $libname.a'
-  shlibpath_var=LIBPATH
-
-  # AIX 3 has no versioning support, so we append a major version to the name.
-  soname_spec='${libname}${release}${shared_ext}$major'
-  ;;
-
-aix[4-9]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  hardcode_into_libs=yes
-  if test "$host_cpu" = ia64; then
-    # AIX 5 supports IA64
-    library_names_spec='${libname}${release}${shared_ext}$major ${libname}${release}${shared_ext}$versuffix $libname${shared_ext}'
-    shlibpath_var=LD_LIBRARY_PATH
-  else
-    # With GCC up to 2.95.x, collect2 would create an import file
-    # for dependence libraries.  The import file would start with
-    # the line `#! .'.  This would cause the generated library to
-    # depend on `.', always an invalid library.  This was fixed in
-    # development snapshots of GCC prior to 3.0.
-    case $host_os in
-      aix4 | aix4.[01] | aix4.[01].*)
-      if { echo '#if __GNUC__ > 2 || (__GNUC__ == 2 && __GNUC_MINOR__ >= 97)'
-	   echo ' yes '
-	   echo '#endif'; } | ${CC} -E - | $GREP yes > /dev/null; then
-	:
-      else
-	can_build_shared=no
-      fi
-      ;;
-    esac
-    # AIX (on Power*) has no versioning support, so currently we can not hardcode correct
-    # soname into executable. Probably we can add versioning support to
-    # collect2, so additional links can be useful in future.
-    if test "$aix_use_runtimelinking" = yes; then
-      # If using run time linking (on AIX 4.2 or later) use lib<name>.so
-      # instead of lib<name>.a to let people know that these are not
-      # typical AIX shared libraries.
-      library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    else
-      # We preserve .a as extension for shared libraries through AIX4.2
-      # and later when we are not doing run time linking.
-      library_names_spec='${libname}${release}.a $libname.a'
-      soname_spec='${libname}${release}${shared_ext}$major'
-    fi
-    shlibpath_var=LIBPATH
-  fi
-  ;;
-
-amigaos*)
-  case $host_cpu in
-  powerpc)
-    # Since July 2007 AmigaOS4 officially supports .so libraries.
-    # When compiling the executable, add -use-dynld -Lsobjs: to the compileline.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    ;;
-  m68k)
-    library_names_spec='$libname.ixlibrary $libname.a'
-    # Create ${libname}_ixlibrary.a entries in /sys/libs.
-    finish_eval='for lib in `ls $libdir/*.ixlibrary 2>/dev/null`; do libname=`func_echo_all "$lib" | $SED '\''s%^.*/\([^/]*\)\.ixlibrary$%\1%'\''`; test $RM /sys/libs/${libname}_ixlibrary.a; $show "cd /sys/libs && $LN_S $lib ${libname}_ixlibrary.a"; cd /sys/libs && $LN_S $lib ${libname}_ixlibrary.a || exit 1; done'
-    ;;
-  esac
-  ;;
-
-beos*)
-  library_names_spec='${libname}${shared_ext}'
-  dynamic_linker="$host_os ld.so"
-  shlibpath_var=LIBRARY_PATH
-  ;;
-
-bsdi[45]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  sys_lib_search_path_spec="/shlib /usr/lib /usr/X11/lib /usr/contrib/lib /lib /usr/local/lib"
-  sys_lib_dlsearch_path_spec="/shlib /usr/lib /usr/local/lib"
-  # the default ld.so.conf also contains /usr/contrib/lib and
-  # /usr/X11R6/lib (/usr/X11 is a link to /usr/X11R6), but let us allow
-  # libtool to hard-code these into programs
-  ;;
-
-cygwin* | mingw* | pw32* | cegcc*)
-  version_type=windows
-  shrext_cmds=".dll"
-  need_version=no
-  need_lib_prefix=no
-
-  case $GCC,$cc_basename in
-  yes,*)
-    # gcc
-    library_names_spec='$libname.dll.a'
-    # DLL is installed to $(libdir)/../bin by postinstall_cmds
-    postinstall_cmds='base_file=`basename \${file}`~
-      dlpath=`$SHELL 2>&1 -c '\''. $dir/'\''\${base_file}'\''i; echo \$dlname'\''`~
-      dldir=$destdir/`dirname \$dlpath`~
-      test -d \$dldir || mkdir -p \$dldir~
-      $install_prog $dir/$dlname \$dldir/$dlname~
-      chmod a+x \$dldir/$dlname~
-      if test -n '\''$stripme'\'' && test -n '\''$striplib'\''; then
-        eval '\''$striplib \$dldir/$dlname'\'' || exit \$?;
-      fi'
-    postuninstall_cmds='dldll=`$SHELL 2>&1 -c '\''. $file; echo \$dlname'\''`~
-      dlpath=$dir/\$dldll~
-       $RM \$dlpath'
-    shlibpath_overrides_runpath=yes
-
-    case $host_os in
-    cygwin*)
-      # Cygwin DLLs use 'cyg' prefix rather than 'lib'
-      soname_spec='`echo ${libname} | sed -e 's/^lib/cyg/'``echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-
-      sys_lib_search_path_spec="$sys_lib_search_path_spec /usr/lib/w32api"
-      ;;
-    mingw* | cegcc*)
-      # MinGW DLLs use traditional 'lib' prefix
-      soname_spec='${libname}`echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-      ;;
-    pw32*)
-      # pw32 DLLs use 'pw' prefix rather than 'lib'
-      library_names_spec='`echo ${libname} | sed -e 's/^lib/pw/'``echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-      ;;
-    esac
-    dynamic_linker='Win32 ld.exe'
-    ;;
-
-  *,cl*)
-    # Native MSVC
-    libname_spec='$name'
-    soname_spec='${libname}`echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-    library_names_spec='${libname}.dll.lib'
-
-    case $build_os in
-    mingw*)
-      sys_lib_search_path_spec=
-      lt_save_ifs=$IFS
-      IFS=';'
-      for lt_path in $LIB
-      do
-        IFS=$lt_save_ifs
-        # Let DOS variable expansion print the short 8.3 style file name.
-        lt_path=`cd "$lt_path" 2>/dev/null && cmd //C "for %i in (".") do @echo %~si"`
-        sys_lib_search_path_spec="$sys_lib_search_path_spec $lt_path"
-      done
-      IFS=$lt_save_ifs
-      # Convert to MSYS style.
-      sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | sed -e 's|\\\\|/|g' -e 's| \\([a-zA-Z]\\):| /\\1|g' -e 's|^ ||'`
-      ;;
-    cygwin*)
-      # Convert to unix form, then to dos form, then back to unix form
-      # but this time dos style (no spaces!) so that the unix form looks
-      # like /cygdrive/c/PROGRA~1:/cygdr...
-      sys_lib_search_path_spec=`cygpath --path --unix "$LIB"`
-      sys_lib_search_path_spec=`cygpath --path --dos "$sys_lib_search_path_spec" 2>/dev/null`
-      sys_lib_search_path_spec=`cygpath --path --unix "$sys_lib_search_path_spec" | $SED -e "s/$PATH_SEPARATOR/ /g"`
-      ;;
-    *)
-      sys_lib_search_path_spec="$LIB"
-      if $ECHO "$sys_lib_search_path_spec" | $GREP ';[c-zC-Z]:/' >/dev/null; then
-        # It is most probably a Windows format PATH.
-        sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | $SED -e 's/;/ /g'`
-      else
-        sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | $SED -e "s/$PATH_SEPARATOR/ /g"`
-      fi
-      # FIXME: find the short name or the path components, as spaces are
-      # common. (e.g. "Program Files" -> "PROGRA~1")
-      ;;
-    esac
-
-    # DLL is installed to $(libdir)/../bin by postinstall_cmds
-    postinstall_cmds='base_file=`basename \${file}`~
-      dlpath=`$SHELL 2>&1 -c '\''. $dir/'\''\${base_file}'\''i; echo \$dlname'\''`~
-      dldir=$destdir/`dirname \$dlpath`~
-      test -d \$dldir || mkdir -p \$dldir~
-      $install_prog $dir/$dlname \$dldir/$dlname'
-    postuninstall_cmds='dldll=`$SHELL 2>&1 -c '\''. $file; echo \$dlname'\''`~
-      dlpath=$dir/\$dldll~
-       $RM \$dlpath'
-    shlibpath_overrides_runpath=yes
-    dynamic_linker='Win32 link.exe'
-    ;;
-
-  *)
-    # Assume MSVC wrapper
-    library_names_spec='${libname}`echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext} $libname.lib'
-    dynamic_linker='Win32 ld.exe'
-    ;;
-  esac
-  # FIXME: first we should search . and the directory the executable is in
-  shlibpath_var=PATH
-  ;;
-
-darwin* | rhapsody*)
-  dynamic_linker="$host_os dyld"
-  version_type=darwin
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${major}$shared_ext ${libname}$shared_ext'
-  soname_spec='${libname}${release}${major}$shared_ext'
-  shlibpath_overrides_runpath=yes
-  shlibpath_var=DYLD_LIBRARY_PATH
-  shrext_cmds='`test .$module = .yes && echo .so || echo .dylib`'
-
-  sys_lib_search_path_spec="$sys_lib_search_path_spec /usr/local/lib"
-  sys_lib_dlsearch_path_spec='/usr/local/lib /lib /usr/lib'
-  ;;
-
-dgux*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname$shared_ext'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  ;;
-
-freebsd* | dragonfly*)
-  # DragonFly does not have aout.  When/if they implement a new
-  # versioning mechanism, adjust this.
-  if test -x /usr/bin/objformat; then
-    objformat=`/usr/bin/objformat`
-  else
-    case $host_os in
-    freebsd[23].*) objformat=aout ;;
-    *) objformat=elf ;;
-    esac
-  fi
-  version_type=freebsd-$objformat
-  case $version_type in
-    freebsd-elf*)
-      library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext} $libname${shared_ext}'
-      need_version=no
-      need_lib_prefix=no
-      ;;
-    freebsd-*)
-      library_names_spec='${libname}${release}${shared_ext}$versuffix $libname${shared_ext}$versuffix'
-      need_version=yes
-      ;;
-  esac
-  shlibpath_var=LD_LIBRARY_PATH
-  case $host_os in
-  freebsd2.*)
-    shlibpath_overrides_runpath=yes
-    ;;
-  freebsd3.[01]* | freebsdelf3.[01]*)
-    shlibpath_overrides_runpath=yes
-    hardcode_into_libs=yes
-    ;;
-  freebsd3.[2-9]* | freebsdelf3.[2-9]* | \
-  freebsd4.[0-5] | freebsdelf4.[0-5] | freebsd4.1.1 | freebsdelf4.1.1)
-    shlibpath_overrides_runpath=no
-    hardcode_into_libs=yes
-    ;;
-  *) # from 4.6 on, and DragonFly
-    shlibpath_overrides_runpath=yes
-    hardcode_into_libs=yes
-    ;;
-  esac
-  ;;
-
-gnu*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}${major} ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-haiku*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  dynamic_linker="$host_os runtime_loader"
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}${major} ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  sys_lib_dlsearch_path_spec='/boot/home/config/lib /boot/common/lib /boot/system/lib'
-  hardcode_into_libs=yes
-  ;;
-
-hpux9* | hpux10* | hpux11*)
-  # Give a soname corresponding to the major version so that dld.sl refuses to
-  # link against other versions.
-  version_type=sunos
-  need_lib_prefix=no
-  need_version=no
-  case $host_cpu in
-  ia64*)
-    shrext_cmds='.so'
-    hardcode_into_libs=yes
-    dynamic_linker="$host_os dld.so"
-    shlibpath_var=LD_LIBRARY_PATH
-    shlibpath_overrides_runpath=yes # Unless +noenvvar is specified.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    if test "X$HPUX_IA64_MODE" = X32; then
-      sys_lib_search_path_spec="/usr/lib/hpux32 /usr/local/lib/hpux32 /usr/local/lib"
-    else
-      sys_lib_search_path_spec="/usr/lib/hpux64 /usr/local/lib/hpux64"
-    fi
-    sys_lib_dlsearch_path_spec=$sys_lib_search_path_spec
-    ;;
-  hppa*64*)
-    shrext_cmds='.sl'
-    hardcode_into_libs=yes
-    dynamic_linker="$host_os dld.sl"
-    shlibpath_var=LD_LIBRARY_PATH # How should we handle SHLIB_PATH
-    shlibpath_overrides_runpath=yes # Unless +noenvvar is specified.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    sys_lib_search_path_spec="/usr/lib/pa20_64 /usr/ccs/lib/pa20_64"
-    sys_lib_dlsearch_path_spec=$sys_lib_search_path_spec
-    ;;
-  *)
-    shrext_cmds='.sl'
-    dynamic_linker="$host_os dld.sl"
-    shlibpath_var=SHLIB_PATH
-    shlibpath_overrides_runpath=no # +s is required to enable SHLIB_PATH
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    ;;
-  esac
-  # HP-UX runs *really* slowly unless shared libraries are mode 555, ...
-  postinstall_cmds='chmod 555 $lib'
-  # or fails outright, so override atomically:
-  install_override_mode=555
-  ;;
-
-interix[3-9]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  dynamic_linker='Interix 3.x ld.so.1 (PE, like ELF)'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-irix5* | irix6* | nonstopux*)
-  case $host_os in
-    nonstopux*) version_type=nonstopux ;;
-    *)
-	if test "$lt_cv_prog_gnu_ld" = yes; then
-		version_type=linux # correct to gnu/linux during the next big refactor
-	else
-		version_type=irix
-	fi ;;
-  esac
-  need_lib_prefix=no
-  need_version=no
-  soname_spec='${libname}${release}${shared_ext}$major'
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${release}${shared_ext} $libname${shared_ext}'
-  case $host_os in
-  irix5* | nonstopux*)
-    libsuff= shlibsuff=
-    ;;
-  *)
-    case $LD in # libtool.m4 will add one of these switches to LD
-    *-32|*"-32 "|*-melf32bsmip|*"-melf32bsmip ")
-      libsuff= shlibsuff= libmagic=32-bit;;
-    *-n32|*"-n32 "|*-melf32bmipn32|*"-melf32bmipn32 ")
-      libsuff=32 shlibsuff=N32 libmagic=N32;;
-    *-64|*"-64 "|*-melf64bmip|*"-melf64bmip ")
-      libsuff=64 shlibsuff=64 libmagic=64-bit;;
-    *) libsuff= shlibsuff= libmagic=never-match;;
-    esac
-    ;;
-  esac
-  shlibpath_var=LD_LIBRARY${shlibsuff}_PATH
-  shlibpath_overrides_runpath=no
-  sys_lib_search_path_spec="/usr/lib${libsuff} /lib${libsuff} /usr/local/lib${libsuff}"
-  sys_lib_dlsearch_path_spec="/usr/lib${libsuff} /lib${libsuff}"
-  hardcode_into_libs=yes
-  ;;
-
-# No shared lib support for Linux oldld, aout, or coff.
-linux*oldld* | linux*aout* | linux*coff*)
-  dynamic_linker=no
-  ;;
-
-# This must be glibc/ELF.
-linux* | k*bsd*-gnu | kopensolaris*-gnu)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig -n $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-
-  # Some binutils ld are patched to set DT_RUNPATH
-  if test "${lt_cv_shlibpath_overrides_runpath+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_shlibpath_overrides_runpath=no
-    save_LDFLAGS=$LDFLAGS
-    save_libdir=$libdir
-    eval "libdir=/foo; wl=\"$lt_prog_compiler_wl\"; \
-	 LDFLAGS=\"\$LDFLAGS $hardcode_libdir_flag_spec\""
-    cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  if  ($OBJDUMP -p conftest$ac_exeext) 2>/dev/null | grep "RUNPATH.*$libdir" >/dev/null; then :
-  lt_cv_shlibpath_overrides_runpath=yes
-fi
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-    LDFLAGS=$save_LDFLAGS
-    libdir=$save_libdir
-
-fi
-
-  shlibpath_overrides_runpath=$lt_cv_shlibpath_overrides_runpath
-
-  # This implies no fast_install, which is unacceptable.
-  # Some rework will be needed to allow for fast_install
-  # before this can be enabled.
-  hardcode_into_libs=yes
-
-  # Append ld.so.conf contents to the search path
-  if test -f /etc/ld.so.conf; then
-    lt_ld_extra=`awk '/^include / { system(sprintf("cd /etc; cat %s 2>/dev/null", \$2)); skip = 1; } { if (!skip) print \$0; skip = 0; }' < /etc/ld.so.conf | $SED -e 's/#.*//;/^[	 ]*hwcap[	 ]/d;s/[:,	]/ /g;s/=[^=]*$//;s/=[^= ]* / /g;s/"//g;/^$/d' | tr '\n' ' '`
-    sys_lib_dlsearch_path_spec="/lib /usr/lib $lt_ld_extra"
-  fi
-
-  # We used to test for /lib/ld.so.1 and disable shared libraries on
-  # powerpc, because MkLinux only supported shared libraries with the
-  # GNU dynamic linker.  Since this was broken with cross compilers,
-  # most powerpc-linux boxes support dynamic linking these days and
-  # people can always --disable-shared, the test was removed, and we
-  # assume the GNU/Linux dynamic linker is in use.
-  dynamic_linker='GNU/Linux ld.so'
-  ;;
-
-netbsd*)
-  version_type=sunos
-  need_lib_prefix=no
-  need_version=no
-  if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-    finish_cmds='PATH="\$PATH:/sbin" ldconfig -m $libdir'
-    dynamic_linker='NetBSD (a.out) ld.so'
-  else
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    dynamic_linker='NetBSD ld.elf_so'
-  fi
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  ;;
-
-newsos6)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  ;;
-
-*nto* | *qnx*)
-  version_type=qnx
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  dynamic_linker='ldqnx.so'
-  ;;
-
-openbsd*)
-  version_type=sunos
-  sys_lib_dlsearch_path_spec="/usr/lib"
-  need_lib_prefix=no
-  # Some older versions of OpenBSD (3.3 at least) *do* need versioned libs.
-  case $host_os in
-    openbsd3.3 | openbsd3.3.*)	need_version=yes ;;
-    *)				need_version=no  ;;
-  esac
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig -m $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  if test -z "`echo __ELF__ | $CC -E - | $GREP __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-    case $host_os in
-      openbsd2.[89] | openbsd2.[89].*)
-	shlibpath_overrides_runpath=no
-	;;
-      *)
-	shlibpath_overrides_runpath=yes
-	;;
-      esac
-  else
-    shlibpath_overrides_runpath=yes
-  fi
-  ;;
-
-os2*)
-  libname_spec='$name'
-  shrext_cmds=".dll"
-  need_lib_prefix=no
-  library_names_spec='$libname${shared_ext} $libname.a'
-  dynamic_linker='OS/2 ld.exe'
-  shlibpath_var=LIBPATH
-  ;;
-
-osf3* | osf4* | osf5*)
-  version_type=osf
-  need_lib_prefix=no
-  need_version=no
-  soname_spec='${libname}${release}${shared_ext}$major'
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  sys_lib_search_path_spec="/usr/shlib /usr/ccs/lib /usr/lib/cmplrs/cc /usr/lib /usr/local/lib /var/shlib"
-  sys_lib_dlsearch_path_spec="$sys_lib_search_path_spec"
-  ;;
-
-rdos*)
-  dynamic_linker=no
-  ;;
-
-solaris*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  # ldd complains unless libraries are executable
-  postinstall_cmds='chmod +x $lib'
-  ;;
-
-sunos4*)
-  version_type=sunos
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-  finish_cmds='PATH="\$PATH:/usr/etc" ldconfig $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  if test "$with_gnu_ld" = yes; then
-    need_lib_prefix=no
-  fi
-  need_version=yes
-  ;;
-
-sysv4 | sysv4.3*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  case $host_vendor in
-    sni)
-      shlibpath_overrides_runpath=no
-      need_lib_prefix=no
-      runpath_var=LD_RUN_PATH
-      ;;
-    siemens)
-      need_lib_prefix=no
-      ;;
-    motorola)
-      need_lib_prefix=no
-      need_version=no
-      shlibpath_overrides_runpath=no
-      sys_lib_search_path_spec='/lib /usr/lib /usr/ccs/lib'
-      ;;
-  esac
-  ;;
-
-sysv4*MP*)
-  if test -d /usr/nec ;then
-    version_type=linux # correct to gnu/linux during the next big refactor
-    library_names_spec='$libname${shared_ext}.$versuffix $libname${shared_ext}.$major $libname${shared_ext}'
-    soname_spec='$libname${shared_ext}.$major'
-    shlibpath_var=LD_LIBRARY_PATH
-  fi
-  ;;
-
-sysv5* | sco3.2v5* | sco5v6* | unixware* | OpenUNIX* | sysv4*uw2*)
-  version_type=freebsd-elf
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext} $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  if test "$with_gnu_ld" = yes; then
-    sys_lib_search_path_spec='/usr/local/lib /usr/gnu/lib /usr/ccs/lib /usr/lib /lib'
-  else
-    sys_lib_search_path_spec='/usr/ccs/lib /usr/lib'
-    case $host_os in
-      sco3.2v5*)
-        sys_lib_search_path_spec="$sys_lib_search_path_spec /lib"
-	;;
-    esac
-  fi
-  sys_lib_dlsearch_path_spec='/usr/lib'
-  ;;
-
-tpf*)
-  # TPF is a cross-target only.  Preferred cross-host = GNU/Linux.
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-uts4*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  ;;
-
-*)
-  dynamic_linker=no
-  ;;
-esac
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $dynamic_linker" >&5
-$as_echo "$dynamic_linker" >&6; }
-test "$dynamic_linker" = no && can_build_shared=no
-
-variables_saved_for_relink="PATH $shlibpath_var $runpath_var"
-if test "$GCC" = yes; then
-  variables_saved_for_relink="$variables_saved_for_relink GCC_EXEC_PREFIX COMPILER_PATH LIBRARY_PATH"
-fi
-
-if test "${lt_cv_sys_lib_search_path_spec+set}" = set; then
-  sys_lib_search_path_spec="$lt_cv_sys_lib_search_path_spec"
-fi
-if test "${lt_cv_sys_lib_dlsearch_path_spec+set}" = set; then
-  sys_lib_dlsearch_path_spec="$lt_cv_sys_lib_dlsearch_path_spec"
-fi
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking how to hardcode library paths into programs" >&5
-$as_echo_n "checking how to hardcode library paths into programs... " >&6; }
-hardcode_action=
-if test -n "$hardcode_libdir_flag_spec" ||
-   test -n "$runpath_var" ||
-   test "X$hardcode_automatic" = "Xyes" ; then
-
-  # We can hardcode non-existent directories.
-  if test "$hardcode_direct" != no &&
-     # If the only mechanism to avoid hardcoding is shlibpath_var, we
-     # have to relink, otherwise we might link with an installed library
-     # when we should be linking with a yet-to-be-installed one
-     ## test "$_LT_TAGVAR(hardcode_shlibpath_var, )" != no &&
-     test "$hardcode_minus_L" != no; then
-    # Linking always hardcodes the temporary library directory.
-    hardcode_action=relink
-  else
-    # We can link without hardcoding, and we can hardcode nonexisting dirs.
-    hardcode_action=immediate
-  fi
-else
-  # We cannot hardcode anything, or else we can only hardcode existing
-  # directories.
-  hardcode_action=unsupported
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $hardcode_action" >&5
-$as_echo "$hardcode_action" >&6; }
-
-if test "$hardcode_action" = relink ||
-   test "$inherit_rpath" = yes; then
-  # Fast installation is not supported
-  enable_fast_install=no
-elif test "$shlibpath_overrides_runpath" = yes ||
-     test "$enable_shared" = no; then
-  # Fast installation is not necessary
-  enable_fast_install=needless
-fi
-
-
-
-
-
-
-  if test "x$enable_dlopen" != xyes; then
-  enable_dlopen=unknown
-  enable_dlopen_self=unknown
-  enable_dlopen_self_static=unknown
-else
-  lt_cv_dlopen=no
-  lt_cv_dlopen_libs=
-
-  case $host_os in
-  beos*)
-    lt_cv_dlopen="load_add_on"
-    lt_cv_dlopen_libs=
-    lt_cv_dlopen_self=yes
-    ;;
-
-  mingw* | pw32* | cegcc*)
-    lt_cv_dlopen="LoadLibrary"
-    lt_cv_dlopen_libs=
-    ;;
-
-  cygwin*)
-    lt_cv_dlopen="dlopen"
-    lt_cv_dlopen_libs=
-    ;;
-
-  darwin*)
-  # if libdl is installed we need to link against it
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking for dlopen in -ldl" >&5
-$as_echo_n "checking for dlopen in -ldl... " >&6; }
-if test "${ac_cv_lib_dl_dlopen+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_check_lib_save_LIBS=$LIBS
-LIBS="-ldl  $LIBS"
-cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-/* Override any GCC internal prototype to avoid an error.
-   Use char because int might match the return type of a GCC
-   builtin and then its argument prototype would still apply.  */
-#ifdef __cplusplus
-extern "C"
-#endif
-char dlopen ();
-int
-main ()
-{
-return dlopen ();
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  ac_cv_lib_dl_dlopen=yes
-else
-  ac_cv_lib_dl_dlopen=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-LIBS=$ac_check_lib_save_LIBS
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_lib_dl_dlopen" >&5
-$as_echo "$ac_cv_lib_dl_dlopen" >&6; }
-if test "x$ac_cv_lib_dl_dlopen" = x""yes; then :
-  lt_cv_dlopen="dlopen" lt_cv_dlopen_libs="-ldl"
-else
-
-    lt_cv_dlopen="dyld"
-    lt_cv_dlopen_libs=
-    lt_cv_dlopen_self=yes
-
-fi
-
-    ;;
-
-  *)
-    ac_fn_c_check_func "$LINENO" "shl_load" "ac_cv_func_shl_load"
-if test "x$ac_cv_func_shl_load" = x""yes; then :
-  lt_cv_dlopen="shl_load"
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for shl_load in -ldld" >&5
-$as_echo_n "checking for shl_load in -ldld... " >&6; }
-if test "${ac_cv_lib_dld_shl_load+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_check_lib_save_LIBS=$LIBS
-LIBS="-ldld  $LIBS"
-cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-/* Override any GCC internal prototype to avoid an error.
-   Use char because int might match the return type of a GCC
-   builtin and then its argument prototype would still apply.  */
-#ifdef __cplusplus
-extern "C"
-#endif
-char shl_load ();
-int
-main ()
-{
-return shl_load ();
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  ac_cv_lib_dld_shl_load=yes
-else
-  ac_cv_lib_dld_shl_load=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-LIBS=$ac_check_lib_save_LIBS
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_lib_dld_shl_load" >&5
-$as_echo "$ac_cv_lib_dld_shl_load" >&6; }
-if test "x$ac_cv_lib_dld_shl_load" = x""yes; then :
-  lt_cv_dlopen="shl_load" lt_cv_dlopen_libs="-ldld"
-else
-  ac_fn_c_check_func "$LINENO" "dlopen" "ac_cv_func_dlopen"
-if test "x$ac_cv_func_dlopen" = x""yes; then :
-  lt_cv_dlopen="dlopen"
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for dlopen in -ldl" >&5
-$as_echo_n "checking for dlopen in -ldl... " >&6; }
-if test "${ac_cv_lib_dl_dlopen+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_check_lib_save_LIBS=$LIBS
-LIBS="-ldl  $LIBS"
-cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-/* Override any GCC internal prototype to avoid an error.
-   Use char because int might match the return type of a GCC
-   builtin and then its argument prototype would still apply.  */
-#ifdef __cplusplus
-extern "C"
-#endif
-char dlopen ();
-int
-main ()
-{
-return dlopen ();
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  ac_cv_lib_dl_dlopen=yes
-else
-  ac_cv_lib_dl_dlopen=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-LIBS=$ac_check_lib_save_LIBS
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_lib_dl_dlopen" >&5
-$as_echo "$ac_cv_lib_dl_dlopen" >&6; }
-if test "x$ac_cv_lib_dl_dlopen" = x""yes; then :
-  lt_cv_dlopen="dlopen" lt_cv_dlopen_libs="-ldl"
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for dlopen in -lsvld" >&5
-$as_echo_n "checking for dlopen in -lsvld... " >&6; }
-if test "${ac_cv_lib_svld_dlopen+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_check_lib_save_LIBS=$LIBS
-LIBS="-lsvld  $LIBS"
-cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-/* Override any GCC internal prototype to avoid an error.
-   Use char because int might match the return type of a GCC
-   builtin and then its argument prototype would still apply.  */
-#ifdef __cplusplus
-extern "C"
-#endif
-char dlopen ();
-int
-main ()
-{
-return dlopen ();
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  ac_cv_lib_svld_dlopen=yes
-else
-  ac_cv_lib_svld_dlopen=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-LIBS=$ac_check_lib_save_LIBS
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_lib_svld_dlopen" >&5
-$as_echo "$ac_cv_lib_svld_dlopen" >&6; }
-if test "x$ac_cv_lib_svld_dlopen" = x""yes; then :
-  lt_cv_dlopen="dlopen" lt_cv_dlopen_libs="-lsvld"
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for dld_link in -ldld" >&5
-$as_echo_n "checking for dld_link in -ldld... " >&6; }
-if test "${ac_cv_lib_dld_dld_link+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_check_lib_save_LIBS=$LIBS
-LIBS="-ldld  $LIBS"
-cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-/* Override any GCC internal prototype to avoid an error.
-   Use char because int might match the return type of a GCC
-   builtin and then its argument prototype would still apply.  */
-#ifdef __cplusplus
-extern "C"
-#endif
-char dld_link ();
-int
-main ()
-{
-return dld_link ();
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  ac_cv_lib_dld_dld_link=yes
-else
-  ac_cv_lib_dld_dld_link=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-LIBS=$ac_check_lib_save_LIBS
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_lib_dld_dld_link" >&5
-$as_echo "$ac_cv_lib_dld_dld_link" >&6; }
-if test "x$ac_cv_lib_dld_dld_link" = x""yes; then :
-  lt_cv_dlopen="dld_link" lt_cv_dlopen_libs="-ldld"
-fi
-
-
-fi
-
-
-fi
-
-
-fi
-
-
-fi
-
-
-fi
-
-    ;;
-  esac
-
-  if test "x$lt_cv_dlopen" != xno; then
-    enable_dlopen=yes
-  else
-    enable_dlopen=no
-  fi
-
-  case $lt_cv_dlopen in
-  dlopen)
-    save_CPPFLAGS="$CPPFLAGS"
-    test "x$ac_cv_header_dlfcn_h" = xyes && CPPFLAGS="$CPPFLAGS -DHAVE_DLFCN_H"
-
-    save_LDFLAGS="$LDFLAGS"
-    wl=$lt_prog_compiler_wl eval LDFLAGS=\"\$LDFLAGS $export_dynamic_flag_spec\"
-
-    save_LIBS="$LIBS"
-    LIBS="$lt_cv_dlopen_libs $LIBS"
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether a program can dlopen itself" >&5
-$as_echo_n "checking whether a program can dlopen itself... " >&6; }
-if test "${lt_cv_dlopen_self+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  	  if test "$cross_compiling" = yes; then :
-  lt_cv_dlopen_self=cross
-else
-  lt_dlunknown=0; lt_dlno_uscore=1; lt_dlneed_uscore=2
-  lt_status=$lt_dlunknown
-  cat > conftest.$ac_ext <<_LT_EOF
-#line $LINENO "configure"
-#include "confdefs.h"
-
-#if HAVE_DLFCN_H
-#include <dlfcn.h>
-#endif
-
-#include <stdio.h>
-
-#ifdef RTLD_GLOBAL
-#  define LT_DLGLOBAL		RTLD_GLOBAL
-#else
-#  ifdef DL_GLOBAL
-#    define LT_DLGLOBAL		DL_GLOBAL
-#  else
-#    define LT_DLGLOBAL		0
-#  endif
-#endif
-
-/* We may have to define LT_DLLAZY_OR_NOW in the command line if we
-   find out it does not work in some platform. */
-#ifndef LT_DLLAZY_OR_NOW
-#  ifdef RTLD_LAZY
-#    define LT_DLLAZY_OR_NOW		RTLD_LAZY
-#  else
-#    ifdef DL_LAZY
-#      define LT_DLLAZY_OR_NOW		DL_LAZY
-#    else
-#      ifdef RTLD_NOW
-#        define LT_DLLAZY_OR_NOW	RTLD_NOW
-#      else
-#        ifdef DL_NOW
-#          define LT_DLLAZY_OR_NOW	DL_NOW
-#        else
-#          define LT_DLLAZY_OR_NOW	0
-#        endif
-#      endif
-#    endif
-#  endif
-#endif
-
-/* When -fvisbility=hidden is used, assume the code has been annotated
-   correspondingly for the symbols needed.  */
-#if defined(__GNUC__) && (((__GNUC__ == 3) && (__GNUC_MINOR__ >= 3)) || (__GNUC__ > 3))
-int fnord () __attribute__((visibility("default")));
-#endif
-
-int fnord () { return 42; }
-int main ()
-{
-  void *self = dlopen (0, LT_DLGLOBAL|LT_DLLAZY_OR_NOW);
-  int status = $lt_dlunknown;
-
-  if (self)
-    {
-      if (dlsym (self,"fnord"))       status = $lt_dlno_uscore;
-      else
-        {
-	  if (dlsym( self,"_fnord"))  status = $lt_dlneed_uscore;
-          else puts (dlerror ());
-	}
-      /* dlclose (self); */
-    }
-  else
-    puts (dlerror ());
-
-  return status;
-}
-_LT_EOF
-  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_link\""; } >&5
-  (eval $ac_link) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; } && test -s conftest${ac_exeext} 2>/dev/null; then
-    (./conftest; exit; ) >&5 2>/dev/null
-    lt_status=$?
-    case x$lt_status in
-      x$lt_dlno_uscore) lt_cv_dlopen_self=yes ;;
-      x$lt_dlneed_uscore) lt_cv_dlopen_self=yes ;;
-      x$lt_dlunknown|x*) lt_cv_dlopen_self=no ;;
-    esac
-  else :
-    # compilation failed
-    lt_cv_dlopen_self=no
-  fi
-fi
-rm -fr conftest*
-
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_dlopen_self" >&5
-$as_echo "$lt_cv_dlopen_self" >&6; }
-
-    if test "x$lt_cv_dlopen_self" = xyes; then
-      wl=$lt_prog_compiler_wl eval LDFLAGS=\"\$LDFLAGS $lt_prog_compiler_static\"
-      { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether a statically linked program can dlopen itself" >&5
-$as_echo_n "checking whether a statically linked program can dlopen itself... " >&6; }
-if test "${lt_cv_dlopen_self_static+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  	  if test "$cross_compiling" = yes; then :
-  lt_cv_dlopen_self_static=cross
-else
-  lt_dlunknown=0; lt_dlno_uscore=1; lt_dlneed_uscore=2
-  lt_status=$lt_dlunknown
-  cat > conftest.$ac_ext <<_LT_EOF
-#line $LINENO "configure"
-#include "confdefs.h"
-
-#if HAVE_DLFCN_H
-#include <dlfcn.h>
-#endif
-
-#include <stdio.h>
-
-#ifdef RTLD_GLOBAL
-#  define LT_DLGLOBAL		RTLD_GLOBAL
-#else
-#  ifdef DL_GLOBAL
-#    define LT_DLGLOBAL		DL_GLOBAL
-#  else
-#    define LT_DLGLOBAL		0
-#  endif
-#endif
-
-/* We may have to define LT_DLLAZY_OR_NOW in the command line if we
-   find out it does not work in some platform. */
-#ifndef LT_DLLAZY_OR_NOW
-#  ifdef RTLD_LAZY
-#    define LT_DLLAZY_OR_NOW		RTLD_LAZY
-#  else
-#    ifdef DL_LAZY
-#      define LT_DLLAZY_OR_NOW		DL_LAZY
-#    else
-#      ifdef RTLD_NOW
-#        define LT_DLLAZY_OR_NOW	RTLD_NOW
-#      else
-#        ifdef DL_NOW
-#          define LT_DLLAZY_OR_NOW	DL_NOW
-#        else
-#          define LT_DLLAZY_OR_NOW	0
-#        endif
-#      endif
-#    endif
-#  endif
-#endif
-
-/* When -fvisbility=hidden is used, assume the code has been annotated
-   correspondingly for the symbols needed.  */
-#if defined(__GNUC__) && (((__GNUC__ == 3) && (__GNUC_MINOR__ >= 3)) || (__GNUC__ > 3))
-int fnord () __attribute__((visibility("default")));
-#endif
-
-int fnord () { return 42; }
-int main ()
-{
-  void *self = dlopen (0, LT_DLGLOBAL|LT_DLLAZY_OR_NOW);
-  int status = $lt_dlunknown;
-
-  if (self)
-    {
-      if (dlsym (self,"fnord"))       status = $lt_dlno_uscore;
-      else
-        {
-	  if (dlsym( self,"_fnord"))  status = $lt_dlneed_uscore;
-          else puts (dlerror ());
-	}
-      /* dlclose (self); */
-    }
-  else
-    puts (dlerror ());
-
-  return status;
-}
-_LT_EOF
-  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_link\""; } >&5
-  (eval $ac_link) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; } && test -s conftest${ac_exeext} 2>/dev/null; then
-    (./conftest; exit; ) >&5 2>/dev/null
-    lt_status=$?
-    case x$lt_status in
-      x$lt_dlno_uscore) lt_cv_dlopen_self_static=yes ;;
-      x$lt_dlneed_uscore) lt_cv_dlopen_self_static=yes ;;
-      x$lt_dlunknown|x*) lt_cv_dlopen_self_static=no ;;
-    esac
-  else :
-    # compilation failed
-    lt_cv_dlopen_self_static=no
-  fi
-fi
-rm -fr conftest*
-
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_dlopen_self_static" >&5
-$as_echo "$lt_cv_dlopen_self_static" >&6; }
-    fi
-
-    CPPFLAGS="$save_CPPFLAGS"
-    LDFLAGS="$save_LDFLAGS"
-    LIBS="$save_LIBS"
-    ;;
-  esac
-
-  case $lt_cv_dlopen_self in
-  yes|no) enable_dlopen_self=$lt_cv_dlopen_self ;;
-  *) enable_dlopen_self=unknown ;;
-  esac
-
-  case $lt_cv_dlopen_self_static in
-  yes|no) enable_dlopen_self_static=$lt_cv_dlopen_self_static ;;
-  *) enable_dlopen_self_static=unknown ;;
-  esac
-fi
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-striplib=
-old_striplib=
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether stripping libraries is possible" >&5
-$as_echo_n "checking whether stripping libraries is possible... " >&6; }
-if test -n "$STRIP" && $STRIP -V 2>&1 | $GREP "GNU strip" >/dev/null; then
-  test -z "$old_striplib" && old_striplib="$STRIP --strip-debug"
-  test -z "$striplib" && striplib="$STRIP --strip-unneeded"
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: yes" >&5
-$as_echo "yes" >&6; }
-else
-# FIXME - insert some real tests, host_os isn't really good enough
-  case $host_os in
-  darwin*)
-    if test -n "$STRIP" ; then
-      striplib="$STRIP -x"
-      old_striplib="$STRIP -S"
-      { $as_echo "$as_me:${as_lineno-$LINENO}: result: yes" >&5
-$as_echo "yes" >&6; }
-    else
-      { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-    fi
-    ;;
-  *)
-    { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-    ;;
-  esac
-fi
-
-
-
-
-
-
-
-
-
-
-
-
-  # Report which library types will actually be built
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if libtool supports shared libraries" >&5
-$as_echo_n "checking if libtool supports shared libraries... " >&6; }
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $can_build_shared" >&5
-$as_echo "$can_build_shared" >&6; }
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether to build shared libraries" >&5
-$as_echo_n "checking whether to build shared libraries... " >&6; }
-  test "$can_build_shared" = "no" && enable_shared=no
-
-  # On AIX, shared libraries and static libraries use the same namespace, and
-  # are all built from PIC.
-  case $host_os in
-  aix3*)
-    test "$enable_shared" = yes && enable_static=no
-    if test -n "$RANLIB"; then
-      archive_cmds="$archive_cmds~\$RANLIB \$lib"
-      postinstall_cmds='$RANLIB $lib'
-    fi
-    ;;
-
-  aix[4-9]*)
-    if test "$host_cpu" != ia64 && test "$aix_use_runtimelinking" = no ; then
-      test "$enable_shared" = yes && enable_static=no
-    fi
-    ;;
-  esac
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $enable_shared" >&5
-$as_echo "$enable_shared" >&6; }
-
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether to build static libraries" >&5
-$as_echo_n "checking whether to build static libraries... " >&6; }
-  # Make sure either enable_shared or enable_static is yes.
-  test "$enable_shared" = yes || enable_static=yes
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $enable_static" >&5
-$as_echo "$enable_static" >&6; }
-
-
-
-
-fi
-ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-
-CC="$lt_save_CC"
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-        ac_config_commands="$ac_config_commands libtool"
-
-
-
-
-# Only expand once:
-
-
-
-
-# Checks for programs.
-ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}gcc", so it can be a program name with args.
-set dummy ${ac_tool_prefix}gcc; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_CC+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$CC"; then
-  ac_cv_prog_CC="$CC" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_CC="${ac_tool_prefix}gcc"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-CC=$ac_cv_prog_CC
-if test -n "$CC"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $CC" >&5
-$as_echo "$CC" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_prog_CC"; then
-  ac_ct_CC=$CC
-  # Extract the first word of "gcc", so it can be a program name with args.
-set dummy gcc; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_CC+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_CC"; then
-  ac_cv_prog_ac_ct_CC="$ac_ct_CC" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_CC="gcc"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_CC=$ac_cv_prog_ac_ct_CC
-if test -n "$ac_ct_CC"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_CC" >&5
-$as_echo "$ac_ct_CC" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_ct_CC" = x; then
-    CC=""
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    CC=$ac_ct_CC
-  fi
-else
-  CC="$ac_cv_prog_CC"
-fi
-
-if test -z "$CC"; then
-          if test -n "$ac_tool_prefix"; then
-    # Extract the first word of "${ac_tool_prefix}cc", so it can be a program name with args.
-set dummy ${ac_tool_prefix}cc; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_CC+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$CC"; then
-  ac_cv_prog_CC="$CC" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_CC="${ac_tool_prefix}cc"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-CC=$ac_cv_prog_CC
-if test -n "$CC"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $CC" >&5
-$as_echo "$CC" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-  fi
-fi
-if test -z "$CC"; then
-  # Extract the first word of "cc", so it can be a program name with args.
-set dummy cc; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_CC+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$CC"; then
-  ac_cv_prog_CC="$CC" # Let the user override the test.
-else
-  ac_prog_rejected=no
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    if test "$as_dir/$ac_word$ac_exec_ext" = "/usr/ucb/cc"; then
-       ac_prog_rejected=yes
-       continue
-     fi
-    ac_cv_prog_CC="cc"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-if test $ac_prog_rejected = yes; then
-  # We found a bogon in the path, so make sure we never use it.
-  set dummy $ac_cv_prog_CC
-  shift
-  if test $# != 0; then
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-    # first if we set CC to just the basename; use the full file name.
-    shift
-    ac_cv_prog_CC="$as_dir/$ac_word${1+' '}$@"
-  fi
-fi
-fi
-fi
-CC=$ac_cv_prog_CC
-if test -n "$CC"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $CC" >&5
-$as_echo "$CC" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$CC"; then
-  if test -n "$ac_tool_prefix"; then
-  for ac_prog in cl.exe
-  do
-    # Extract the first word of "$ac_tool_prefix$ac_prog", so it can be a program name with args.
-set dummy $ac_tool_prefix$ac_prog; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_CC+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$CC"; then
-  ac_cv_prog_CC="$CC" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_CC="$ac_tool_prefix$ac_prog"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-CC=$ac_cv_prog_CC
-if test -n "$CC"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $CC" >&5
-$as_echo "$CC" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-    test -n "$CC" && break
-  done
-fi
-if test -z "$CC"; then
-  ac_ct_CC=$CC
-  for ac_prog in cl.exe
-do
-  # Extract the first word of "$ac_prog", so it can be a program name with args.
-set dummy $ac_prog; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_prog_ac_ct_CC+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -n "$ac_ct_CC"; then
-  ac_cv_prog_ac_ct_CC="$ac_ct_CC" # Let the user override the test.
-else
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_prog_ac_ct_CC="$ac_prog"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-fi
-fi
-ac_ct_CC=$ac_cv_prog_ac_ct_CC
-if test -n "$ac_ct_CC"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_ct_CC" >&5
-$as_echo "$ac_ct_CC" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-  test -n "$ac_ct_CC" && break
-done
-
-  if test "x$ac_ct_CC" = x; then
-    CC=""
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    CC=$ac_ct_CC
-  fi
-fi
-
-fi
-
-
-test -z "$CC" && { { $as_echo "$as_me:${as_lineno-$LINENO}: error: in \`$ac_pwd':" >&5
-$as_echo "$as_me: error: in \`$ac_pwd':" >&2;}
-as_fn_error $? "no acceptable C compiler found in \$PATH
-See \`config.log' for more details" "$LINENO" 5 ; }
-
-# Provide some information about the compiler.
-$as_echo "$as_me:${as_lineno-$LINENO}: checking for C compiler version" >&5
-set X $ac_compile
-ac_compiler=$2
-for ac_option in --version -v -V -qversion; do
-  { { ac_try="$ac_compiler $ac_option >&5"
-case "(($ac_try" in
-  *\"* | *\`* | *\\*) ac_try_echo=\$ac_try;;
-  *) ac_try_echo=$ac_try;;
-esac
-eval ac_try_echo="\"\$as_me:${as_lineno-$LINENO}: $ac_try_echo\""
-$as_echo "$ac_try_echo"; } >&5
-  (eval "$ac_compiler $ac_option >&5") 2>conftest.err
-  ac_status=$?
-  if test -s conftest.err; then
-    sed '10a\
-... rest of stderr output deleted ...
-         10q' conftest.err >conftest.er1
-    cat conftest.er1 >&5
-  fi
-  rm -f conftest.er1 conftest.err
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }
-done
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether we are using the GNU C compiler" >&5
-$as_echo_n "checking whether we are using the GNU C compiler... " >&6; }
-if test "${ac_cv_c_compiler_gnu+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-#ifndef __GNUC__
-       choke me
-#endif
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_compile "$LINENO"; then :
-  ac_compiler_gnu=yes
-else
-  ac_compiler_gnu=no
-fi
-rm -f core conftest.err conftest.$ac_objext conftest.$ac_ext
-ac_cv_c_compiler_gnu=$ac_compiler_gnu
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_c_compiler_gnu" >&5
-$as_echo "$ac_cv_c_compiler_gnu" >&6; }
-if test $ac_compiler_gnu = yes; then
-  GCC=yes
-else
-  GCC=
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-ac_test_CFLAGS=${CFLAGS+set}
-ac_save_CFLAGS=$CFLAGS
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether $CC accepts -g" >&5
-$as_echo_n "checking whether $CC accepts -g... " >&6; }
-if test "${ac_cv_prog_cc_g+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_save_c_werror_flag=$ac_c_werror_flag
-   ac_c_werror_flag=yes
-   ac_cv_prog_cc_g=no
-   CFLAGS="-g"
-   cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_compile "$LINENO"; then :
-  ac_cv_prog_cc_g=yes
-else
-  CFLAGS=""
-      cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_compile "$LINENO"; then :
-
-else
-  ac_c_werror_flag=$ac_save_c_werror_flag
-	 CFLAGS="-g"
-	 cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_compile "$LINENO"; then :
-  ac_cv_prog_cc_g=yes
-fi
-rm -f core conftest.err conftest.$ac_objext conftest.$ac_ext
-fi
-rm -f core conftest.err conftest.$ac_objext conftest.$ac_ext
-fi
-rm -f core conftest.err conftest.$ac_objext conftest.$ac_ext
-   ac_c_werror_flag=$ac_save_c_werror_flag
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_prog_cc_g" >&5
-$as_echo "$ac_cv_prog_cc_g" >&6; }
-if test "$ac_test_CFLAGS" = set; then
-  CFLAGS=$ac_save_CFLAGS
-elif test $ac_cv_prog_cc_g = yes; then
-  if test "$GCC" = yes; then
-    CFLAGS="-g -O2"
-  else
-    CFLAGS="-g"
-  fi
-else
-  if test "$GCC" = yes; then
-    CFLAGS="-O2"
-  else
-    CFLAGS=
-  fi
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $CC option to accept ISO C89" >&5
-$as_echo_n "checking for $CC option to accept ISO C89... " >&6; }
-if test "${ac_cv_prog_cc_c89+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  ac_cv_prog_cc_c89=no
-ac_save_CC=$CC
-cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-#include <stdarg.h>
-#include <stdio.h>
-#include <sys/types.h>
-#include <sys/stat.h>
-/* Most of the following tests are stolen from RCS 5.7's src/conf.sh.  */
-struct buf { int x; };
-FILE * (*rcsopen) (struct buf *, struct stat *, int);
-static char *e (p, i)
-     char **p;
-     int i;
-{
-  return p[i];
-}
-static char *f (char * (*g) (char **, int), char **p, ...)
-{
-  char *s;
-  va_list v;
-  va_start (v,p);
-  s = g (p, va_arg (v,int));
-  va_end (v);
-  return s;
-}
-
-/* OSF 4.0 Compaq cc is some sort of almost-ANSI by default.  It has
-   function prototypes and stuff, but not '\xHH' hex character constants.
-   These don't provoke an error unfortunately, instead are silently treated
-   as 'x'.  The following induces an error, until -std is added to get
-   proper ANSI mode.  Curiously '\x00'!='x' always comes out true, for an
-   array size at least.  It's necessary to write '\x00'==0 to get something
-   that's true only with -std.  */
-int osf4_cc_array ['\x00' == 0 ? 1 : -1];
-
-/* IBM C 6 for AIX is almost-ANSI by default, but it replaces macro parameters
-   inside strings and character constants.  */
-#define FOO(x) 'x'
-int xlc6_cc_array[FOO(a) == 'x' ? 1 : -1];
-
-int test (int i, double x);
-struct s1 {int (*f) (int a);};
-struct s2 {int (*f) (double a);};
-int pairnames (int, char **, FILE *(*)(struct buf *, struct stat *, int), int, int);
-int argc;
-char **argv;
-int
-main ()
-{
-return f (e, argv, 0) != argv[0]  ||  f (e, argv, 1) != argv[1];
-  ;
-  return 0;
-}
-_ACEOF
-for ac_arg in '' -qlanglvl=extc89 -qlanglvl=ansi -std \
-	-Ae "-Aa -D_HPUX_SOURCE" "-Xc -D__EXTENSIONS__"
-do
-  CC="$ac_save_CC $ac_arg"
-  if ac_fn_c_try_compile "$LINENO"; then :
-  ac_cv_prog_cc_c89=$ac_arg
-fi
-rm -f core conftest.err conftest.$ac_objext
-  test "x$ac_cv_prog_cc_c89" != "xno" && break
-done
-rm -f conftest.$ac_ext
-CC=$ac_save_CC
-
-fi
-# AC_CACHE_VAL
-case "x$ac_cv_prog_cc_c89" in
-  x)
-    { $as_echo "$as_me:${as_lineno-$LINENO}: result: none needed" >&5
-$as_echo "none needed" >&6; } ;;
-  xno)
-    { $as_echo "$as_me:${as_lineno-$LINENO}: result: unsupported" >&5
-$as_echo "unsupported" >&6; } ;;
-  *)
-    CC="$CC $ac_cv_prog_cc_c89"
-    { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_cv_prog_cc_c89" >&5
-$as_echo "$ac_cv_prog_cc_c89" >&6; } ;;
-esac
-if test "x$ac_cv_prog_cc_c89" != xno; then :
-
-fi
-
-ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-
-depcc="$CC"   am_compiler_list=
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking dependency style of $depcc" >&5
-$as_echo_n "checking dependency style of $depcc... " >&6; }
-if test "${am_cv_CC_dependencies_compiler_type+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -z "$AMDEP_TRUE" && test -f "$am_depcomp"; then
-  # We make a subdir and do the tests there.  Otherwise we can end up
-  # making bogus files that we don't know about and never remove.  For
-  # instance it was reported that on HP-UX the gcc test will end up
-  # making a dummy file named `D' -- because `-MD' means `put the output
-  # in D'.
-  mkdir conftest.dir
-  # Copy depcomp to subdir because otherwise we won't find it if we're
-  # using a relative directory.
-  cp "$am_depcomp" conftest.dir
-  cd conftest.dir
-  # We will build objects and dependencies in a subdirectory because
-  # it helps to detect inapplicable dependency modes.  For instance
-  # both Tru64's cc and ICC support -MD to output dependencies as a
-  # side effect of compilation, but ICC will put the dependencies in
-  # the current directory while Tru64 will put them in the object
-  # directory.
-  mkdir sub
-
-  am_cv_CC_dependencies_compiler_type=none
-  if test "$am_compiler_list" = ""; then
-     am_compiler_list=`sed -n 's/^#*\([a-zA-Z0-9]*\))$/\1/p' < ./depcomp`
-  fi
-  am__universal=false
-  case " $depcc " in #(
-     *\ -arch\ *\ -arch\ *) am__universal=true ;;
-     esac
-
-  for depmode in $am_compiler_list; do
-    # Setup a source with many dependencies, because some compilers
-    # like to wrap large dependency lists on column 80 (with \), and
-    # we should not choose a depcomp mode which is confused by this.
-    #
-    # We need to recreate these files for each test, as the compiler may
-    # overwrite some of them when testing with obscure command lines.
-    # This happens at least with the AIX C compiler.
-    : > sub/conftest.c
-    for i in 1 2 3 4 5 6; do
-      echo '#include "conftst'$i'.h"' >> sub/conftest.c
-      # Using `: > sub/conftst$i.h' creates only sub/conftst1.h with
-      # Solaris 8's {/usr,}/bin/sh.
-      touch sub/conftst$i.h
-    done
-    echo "${am__include} ${am__quote}sub/conftest.Po${am__quote}" > confmf
-
-    # We check with `-c' and `-o' for the sake of the "dashmstdout"
-    # mode.  It turns out that the SunPro C++ compiler does not properly
-    # handle `-M -o', and we need to detect this.  Also, some Intel
-    # versions had trouble with output in subdirs
-    am__obj=sub/conftest.${OBJEXT-o}
-    am__minus_obj="-o $am__obj"
-    case $depmode in
-    gcc)
-      # This depmode causes a compiler race in universal mode.
-      test "$am__universal" = false || continue
-      ;;
-    nosideeffect)
-      # after this tag, mechanisms are not by side-effect, so they'll
-      # only be used when explicitly requested
-      if test "x$enable_dependency_tracking" = xyes; then
-	continue
-      else
-	break
-      fi
-      ;;
-    msvisualcpp | msvcmsys)
-      # This compiler won't grok `-c -o', but also, the minuso test has
-      # not run yet.  These depmodes are late enough in the game, and
-      # so weak that their functioning should not be impacted.
-      am__obj=conftest.${OBJEXT-o}
-      am__minus_obj=
-      ;;
-    none) break ;;
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-hardcode_libdir_flag_spec_CXX=
-hardcode_libdir_separator_CXX=
-hardcode_minus_L_CXX=no
-hardcode_shlibpath_var_CXX=unsupported
-hardcode_automatic_CXX=no
-inherit_rpath_CXX=no
-module_cmds_CXX=
-module_expsym_cmds_CXX=
-link_all_deplibs_CXX=unknown
-old_archive_cmds_CXX=$old_archive_cmds
-reload_flag_CXX=$reload_flag
-reload_cmds_CXX=$reload_cmds
-no_undefined_flag_CXX=
-whole_archive_flag_spec_CXX=
-enable_shared_with_static_runtimes_CXX=no
-
-# Source file extension for C++ test sources.
-ac_ext=cpp
-
-# Object file extension for compiled C++ test sources.
-objext=o
-objext_CXX=$objext
-
-# No sense in running all these tests if we already determined that
-# the CXX compiler isn't working.  Some variables (like enable_shared)
-# are currently assumed to apply to all compilers on this platform,
-# and will be corrupted by setting them based on a non-working compiler.
-if test "$_lt_caught_CXX_error" != yes; then
-  # Code to be used in simple compile tests
-  lt_simple_compile_test_code="int some_variable = 0;"
-
-  # Code to be used in simple link tests
-  lt_simple_link_test_code='int main(int, char *[]) { return(0); }'
-
-  # ltmain only uses $CC for tagged configurations so make sure $CC is set.
-
-
-
-
-
-
-# If no C compiler was specified, use CC.
-LTCC=${LTCC-"$CC"}
-
-# If no C compiler flags were specified, use CFLAGS.
-LTCFLAGS=${LTCFLAGS-"$CFLAGS"}
-
-# Allow CC to be a program name with arguments.
-compiler=$CC
-
-
-  # save warnings/boilerplate of simple test code
-  ac_outfile=conftest.$ac_objext
-echo "$lt_simple_compile_test_code" >conftest.$ac_ext
-eval "$ac_compile" 2>&1 >/dev/null | $SED '/^$/d; /^ *+/d' >conftest.err
-_lt_compiler_boilerplate=`cat conftest.err`
-$RM conftest*
-
-  ac_outfile=conftest.$ac_objext
-echo "$lt_simple_link_test_code" >conftest.$ac_ext
-eval "$ac_link" 2>&1 >/dev/null | $SED '/^$/d; /^ *+/d' >conftest.err
-_lt_linker_boilerplate=`cat conftest.err`
-$RM -r conftest*
-
-
-  # Allow CC to be a program name with arguments.
-  lt_save_CC=$CC
-  lt_save_CFLAGS=$CFLAGS
-  lt_save_LD=$LD
-  lt_save_GCC=$GCC
-  GCC=$GXX
-  lt_save_with_gnu_ld=$with_gnu_ld
-  lt_save_path_LD=$lt_cv_path_LD
-  if test -n "${lt_cv_prog_gnu_ldcxx+set}"; then
-    lt_cv_prog_gnu_ld=$lt_cv_prog_gnu_ldcxx
-  else
-    $as_unset lt_cv_prog_gnu_ld
-  fi
-  if test -n "${lt_cv_path_LDCXX+set}"; then
-    lt_cv_path_LD=$lt_cv_path_LDCXX
-  else
-    $as_unset lt_cv_path_LD
-  fi
-  test -z "${LDCXX+set}" || LD=$LDCXX
-  CC=${CXX-"c++"}
-  CFLAGS=$CXXFLAGS
-  compiler=$CC
-  compiler_CXX=$CC
-  for cc_temp in $compiler""; do
-  case $cc_temp in
-    compile | *[\\/]compile | ccache | *[\\/]ccache ) ;;
-    distcc | *[\\/]distcc | purify | *[\\/]purify ) ;;
-    \-*) ;;
-    *) break;;
-  esac
-done
-cc_basename=`$ECHO "$cc_temp" | $SED "s%.*/%%; s%^$host_alias-%%"`
-
-
-  if test -n "$compiler"; then
-    # We don't want -fno-exception when compiling C++ code, so set the
-    # no_builtin_flag separately
-    if test "$GXX" = yes; then
-      lt_prog_compiler_no_builtin_flag_CXX=' -fno-builtin'
-    else
-      lt_prog_compiler_no_builtin_flag_CXX=
-    fi
-
-    if test "$GXX" = yes; then
-      # Set up default GNU C++ configuration
-
-
-
-# Check whether --with-gnu-ld was given.
-if test "${with_gnu_ld+set}" = set; then :
-  withval=$with_gnu_ld; test "$withval" = no || with_gnu_ld=yes
-else
-  with_gnu_ld=no
-fi
-
-ac_prog=ld
-if test "$GCC" = yes; then
-  # Check if gcc -print-prog-name=ld gives a path.
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for ld used by $CC" >&5
-$as_echo_n "checking for ld used by $CC... " >&6; }
-  case $host in
-  *-*-mingw*)
-    # gcc leaves a trailing carriage return which upsets mingw
-    ac_prog=`($CC -print-prog-name=ld) 2>&5 | tr -d '\015'` ;;
-  *)
-    ac_prog=`($CC -print-prog-name=ld) 2>&5` ;;
-  esac
-  case $ac_prog in
-    # Accept absolute paths.
-    [\\/]* | ?:[\\/]*)
-      re_direlt='/[^/][^/]*/\.\./'
-      # Canonicalize the pathname of ld
-      ac_prog=`$ECHO "$ac_prog"| $SED 's%\\\\%/%g'`
-      while $ECHO "$ac_prog" | $GREP "$re_direlt" > /dev/null 2>&1; do
-	ac_prog=`$ECHO $ac_prog| $SED "s%$re_direlt%/%"`
-      done
-      test -z "$LD" && LD="$ac_prog"
-      ;;
-  "")
-    # If it fails, then pretend we aren't using GCC.
-    ac_prog=ld
-    ;;
-  *)
-    # If it is relative, then search for the first ld in PATH.
-    with_gnu_ld=unknown
-    ;;
-  esac
-elif test "$with_gnu_ld" = yes; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for GNU ld" >&5
-$as_echo_n "checking for GNU ld... " >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking for non-GNU ld" >&5
-$as_echo_n "checking for non-GNU ld... " >&6; }
-fi
-if test "${lt_cv_path_LD+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  if test -z "$LD"; then
-  lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-  for ac_dir in $PATH; do
-    IFS="$lt_save_ifs"
-    test -z "$ac_dir" && ac_dir=.
-    if test -f "$ac_dir/$ac_prog" || test -f "$ac_dir/$ac_prog$ac_exeext"; then
-      lt_cv_path_LD="$ac_dir/$ac_prog"
-      # Check to see if the program is GNU ld.  I'd rather use --version,
-      # but apparently some variants of GNU ld only accept -v.
-      # Break only if it was the GNU/non-GNU ld that we prefer.
-      case `"$lt_cv_path_LD" -v 2>&1 </dev/null` in
-      *GNU* | *'with BFD'*)
-	test "$with_gnu_ld" != no && break
-	;;
-      *)
-	test "$with_gnu_ld" != yes && break
-	;;
-      esac
-    fi
-  done
-  IFS="$lt_save_ifs"
-else
-  lt_cv_path_LD="$LD" # Let the user override the test with a path.
-fi
-fi
-
-LD="$lt_cv_path_LD"
-if test -n "$LD"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $LD" >&5
-$as_echo "$LD" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-test -z "$LD" && as_fn_error $? "no acceptable ld found in \$PATH" "$LINENO" 5
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking if the linker ($LD) is GNU ld" >&5
-$as_echo_n "checking if the linker ($LD) is GNU ld... " >&6; }
-if test "${lt_cv_prog_gnu_ld+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  # I'd rather use --version here, but apparently some GNU lds only accept -v.
-case `$LD -v 2>&1 </dev/null` in
-*GNU* | *'with BFD'*)
-  lt_cv_prog_gnu_ld=yes
-  ;;
-*)
-  lt_cv_prog_gnu_ld=no
-  ;;
-esac
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_gnu_ld" >&5
-$as_echo "$lt_cv_prog_gnu_ld" >&6; }
-with_gnu_ld=$lt_cv_prog_gnu_ld
-
-
-
-
-
-
-
-      # Check if GNU C++ uses GNU ld as the underlying linker, since the
-      # archiving commands below assume that GNU ld is being used.
-      if test "$with_gnu_ld" = yes; then
-        archive_cmds_CXX='$CC $pic_flag -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname -o $lib'
-        archive_expsym_cmds_CXX='$CC $pic_flag -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-
-        hardcode_libdir_flag_spec_CXX='${wl}-rpath ${wl}$libdir'
-        export_dynamic_flag_spec_CXX='${wl}--export-dynamic'
-
-        # If archive_cmds runs LD, not CC, wlarc should be empty
-        # XXX I think wlarc can be eliminated in ltcf-cxx, but I need to
-        #     investigate it a little bit more. (MM)
-        wlarc='${wl}'
-
-        # ancient GNU ld didn't support --whole-archive et. al.
-        if eval "`$CC -print-prog-name=ld` --help 2>&1" |
-	  $GREP 'no-whole-archive' > /dev/null; then
-          whole_archive_flag_spec_CXX="$wlarc"'--whole-archive$convenience '"$wlarc"'--no-whole-archive'
-        else
-          whole_archive_flag_spec_CXX=
-        fi
-      else
-        with_gnu_ld=no
-        wlarc=
-
-        # A generic and very simple default shared library creation
-        # command for GNU C++ for the case where it uses the native
-        # linker, instead of GNU ld.  If possible, this setting should
-        # overridden to take advantage of the native linker features on
-        # the platform it is being used on.
-        archive_cmds_CXX='$CC -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $lib'
-      fi
-
-      # Commands to make compiler produce verbose output that lists
-      # what "hidden" libraries, object files and flags are used when
-      # linking a shared library.
-      output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-
-    else
-      GXX=no
-      with_gnu_ld=no
-      wlarc=
-    fi
-
-    # PORTME: fill in a description of your system's C++ link characteristics
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether the $compiler linker ($LD) supports shared libraries" >&5
-$as_echo_n "checking whether the $compiler linker ($LD) supports shared libraries... " >&6; }
-    ld_shlibs_CXX=yes
-    case $host_os in
-      aix3*)
-        # FIXME: insert proper C++ library support
-        ld_shlibs_CXX=no
-        ;;
-      aix[4-9]*)
-        if test "$host_cpu" = ia64; then
-          # On IA64, the linker does run time linking by default, so we don't
-          # have to do anything special.
-          aix_use_runtimelinking=no
-          exp_sym_flag='-Bexport'
-          no_entry_flag=""
-        else
-          aix_use_runtimelinking=no
-
-          # Test if we are trying to use run time linking or normal
-          # AIX style linking. If -brtl is somewhere in LDFLAGS, we
-          # need to do runtime linking.
-          case $host_os in aix4.[23]|aix4.[23].*|aix[5-9]*)
-	    for ld_flag in $LDFLAGS; do
-	      case $ld_flag in
-	      *-brtl*)
-	        aix_use_runtimelinking=yes
-	        break
-	        ;;
-	      esac
-	    done
-	    ;;
-          esac
-
-          exp_sym_flag='-bexport'
-          no_entry_flag='-bnoentry'
-        fi
-
-        # When large executables or shared objects are built, AIX ld can
-        # have problems creating the table of contents.  If linking a library
-        # or program results in "error TOC overflow" add -mminimal-toc to
-        # CXXFLAGS/CFLAGS for g++/gcc.  In the cases where that is not
-        # enough to fix the problem, add -Wl,-bbigtoc to LDFLAGS.
-
-        archive_cmds_CXX=''
-        hardcode_direct_CXX=yes
-        hardcode_direct_absolute_CXX=yes
-        hardcode_libdir_separator_CXX=':'
-        link_all_deplibs_CXX=yes
-        file_list_spec_CXX='${wl}-f,'
-
-        if test "$GXX" = yes; then
-          case $host_os in aix4.[012]|aix4.[012].*)
-          # We only want to do this on AIX 4.2 and lower, the check
-          # below for broken collect2 doesn't work under 4.3+
-	  collect2name=`${CC} -print-prog-name=collect2`
-	  if test -f "$collect2name" &&
-	     strings "$collect2name" | $GREP resolve_lib_name >/dev/null
-	  then
-	    # We have reworked collect2
-	    :
-	  else
-	    # We have old collect2
-	    hardcode_direct_CXX=unsupported
-	    # It fails to find uninstalled libraries when the uninstalled
-	    # path is not listed in the libpath.  Setting hardcode_minus_L
-	    # to unsupported forces relinking
-	    hardcode_minus_L_CXX=yes
-	    hardcode_libdir_flag_spec_CXX='-L$libdir'
-	    hardcode_libdir_separator_CXX=
-	  fi
-          esac
-          shared_flag='-shared'
-	  if test "$aix_use_runtimelinking" = yes; then
-	    shared_flag="$shared_flag "'${wl}-G'
-	  fi
-        else
-          # not using gcc
-          if test "$host_cpu" = ia64; then
-	  # VisualAge C++, Version 5.5 for AIX 5L for IA-64, Beta 3 Release
-	  # chokes on -Wl,-G. The following line is correct:
-	  shared_flag='-G'
-          else
-	    if test "$aix_use_runtimelinking" = yes; then
-	      shared_flag='${wl}-G'
-	    else
-	      shared_flag='${wl}-bM:SRE'
-	    fi
-          fi
-        fi
-
-        export_dynamic_flag_spec_CXX='${wl}-bexpall'
-        # It seems that -bexpall does not export symbols beginning with
-        # underscore (_), so it is better to generate a list of symbols to
-	# export.
-        always_export_symbols_CXX=yes
-        if test "$aix_use_runtimelinking" = yes; then
-          # Warning - without using the other runtime loading flags (-brtl),
-          # -berok will link without error, but may produce a broken library.
-          allow_undefined_flag_CXX='-berok'
-          # Determine the default libpath from the value encoded in an empty
-          # executable.
-          if test "${lt_cv_aix_libpath+set}" = set; then
-  aix_libpath=$lt_cv_aix_libpath
-else
-  if test "${lt_cv_aix_libpath__CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_cxx_try_link "$LINENO"; then :
-
-  lt_aix_libpath_sed='
-      /Import File Strings/,/^$/ {
-	  /^0/ {
-	      s/^0  *\([^ ]*\) *$/\1/
-	      p
-	  }
-      }'
-  lt_cv_aix_libpath__CXX=`dump -H conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  # Check for a 64-bit object if we didn't find anything.
-  if test -z "$lt_cv_aix_libpath__CXX"; then
-    lt_cv_aix_libpath__CXX=`dump -HX64 conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  fi
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-  if test -z "$lt_cv_aix_libpath__CXX"; then
-    lt_cv_aix_libpath__CXX="/usr/lib:/lib"
-  fi
-
-fi
-
-  aix_libpath=$lt_cv_aix_libpath__CXX
-fi
-
-          hardcode_libdir_flag_spec_CXX='${wl}-blibpath:$libdir:'"$aix_libpath"
-
-          archive_expsym_cmds_CXX='$CC -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags `if test "x${allow_undefined_flag}" != "x"; then func_echo_all "${wl}${allow_undefined_flag}"; else :; fi` '"\${wl}$exp_sym_flag:\$export_symbols $shared_flag"
-        else
-          if test "$host_cpu" = ia64; then
-	    hardcode_libdir_flag_spec_CXX='${wl}-R $libdir:/usr/lib:/lib'
-	    allow_undefined_flag_CXX="-z nodefs"
-	    archive_expsym_cmds_CXX="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags ${wl}${allow_undefined_flag} '"\${wl}$exp_sym_flag:\$export_symbols"
-          else
-	    # Determine the default libpath from the value encoded in an
-	    # empty executable.
-	    if test "${lt_cv_aix_libpath+set}" = set; then
-  aix_libpath=$lt_cv_aix_libpath
-else
-  if test "${lt_cv_aix_libpath__CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_cxx_try_link "$LINENO"; then :
-
-  lt_aix_libpath_sed='
-      /Import File Strings/,/^$/ {
-	  /^0/ {
-	      s/^0  *\([^ ]*\) *$/\1/
-	      p
-	  }
-      }'
-  lt_cv_aix_libpath__CXX=`dump -H conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  # Check for a 64-bit object if we didn't find anything.
-  if test -z "$lt_cv_aix_libpath__CXX"; then
-    lt_cv_aix_libpath__CXX=`dump -HX64 conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  fi
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-  if test -z "$lt_cv_aix_libpath__CXX"; then
-    lt_cv_aix_libpath__CXX="/usr/lib:/lib"
-  fi
-
-fi
-
-  aix_libpath=$lt_cv_aix_libpath__CXX
-fi
-
-	    hardcode_libdir_flag_spec_CXX='${wl}-blibpath:$libdir:'"$aix_libpath"
-	    # Warning - without using the other run time loading flags,
-	    # -berok will link without error, but may produce a broken library.
-	    no_undefined_flag_CXX=' ${wl}-bernotok'
-	    allow_undefined_flag_CXX=' ${wl}-berok'
-	    if test "$with_gnu_ld" = yes; then
-	      # We only use this code for GNU lds that support --whole-archive.
-	      whole_archive_flag_spec_CXX='${wl}--whole-archive$convenience ${wl}--no-whole-archive'
-	    else
-	      # Exported symbols can be pulled into shared objects from archives
-	      whole_archive_flag_spec_CXX='$convenience'
-	    fi
-	    archive_cmds_need_lc_CXX=yes
-	    # This is similar to how AIX traditionally builds its shared
-	    # libraries.
-	    archive_expsym_cmds_CXX="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs ${wl}-bnoentry $compiler_flags ${wl}-bE:$export_symbols${allow_undefined_flag}~$AR $AR_FLAGS $output_objdir/$libname$release.a $output_objdir/$soname'
-          fi
-        fi
-        ;;
-
-      beos*)
-	if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	  allow_undefined_flag_CXX=unsupported
-	  # Joseph Beckenbach <jrb3@best.com> says some releases of gcc
-	  # support --undefined.  This deserves some investigation.  FIXME
-	  archive_cmds_CXX='$CC -nostart $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	else
-	  ld_shlibs_CXX=no
-	fi
-	;;
-
-      chorus*)
-        case $cc_basename in
-          *)
-	  # FIXME: insert proper C++ library support
-	  ld_shlibs_CXX=no
-	  ;;
-        esac
-        ;;
-
-      cygwin* | mingw* | pw32* | cegcc*)
-	case $GXX,$cc_basename in
-	,cl* | no,cl*)
-	  # Native MSVC
-	  # hardcode_libdir_flag_spec is actually meaningless, as there is
-	  # no search path for DLLs.
-	  hardcode_libdir_flag_spec_CXX=' '
-	  allow_undefined_flag_CXX=unsupported
-	  always_export_symbols_CXX=yes
-	  file_list_spec_CXX='@'
-	  # Tell ltmain to make .lib files, not .a files.
-	  libext=lib
-	  # Tell ltmain to make .dll files, not .so files.
-	  shrext_cmds=".dll"
-	  # FIXME: Setting linknames here is a bad hack.
-	  archive_cmds_CXX='$CC -o $output_objdir/$soname $libobjs $compiler_flags $deplibs -Wl,-dll~linknames='
-	  archive_expsym_cmds_CXX='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	      $SED -n -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' -e '1\\\!p' < $export_symbols > $output_objdir/$soname.exp;
-	    else
-	      $SED -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' < $export_symbols > $output_objdir/$soname.exp;
-	    fi~
-	    $CC -o $tool_output_objdir$soname $libobjs $compiler_flags $deplibs "@$tool_output_objdir$soname.exp" -Wl,-DLL,-IMPLIB:"$tool_output_objdir$libname.dll.lib"~
-	    linknames='
-	  # The linker will not automatically build a static lib if we build a DLL.
-	  # _LT_TAGVAR(old_archive_from_new_cmds, CXX)='true'
-	  enable_shared_with_static_runtimes_CXX=yes
-	  # Don't use ranlib
-	  old_postinstall_cmds_CXX='chmod 644 $oldlib'
-	  postlink_cmds_CXX='lt_outputfile="@OUTPUT@"~
-	    lt_tool_outputfile="@TOOL_OUTPUT@"~
-	    case $lt_outputfile in
-	      *.exe|*.EXE) ;;
-	      *)
-		lt_outputfile="$lt_outputfile.exe"
-		lt_tool_outputfile="$lt_tool_outputfile.exe"
-		;;
-	    esac~
-	    func_to_tool_file "$lt_outputfile"~
-	    if test "$MANIFEST_TOOL" != ":" && test -f "$lt_outputfile.manifest"; then
-	      $MANIFEST_TOOL -manifest "$lt_tool_outputfile.manifest" -outputresource:"$lt_tool_outputfile" || exit 1;
-	      $RM "$lt_outputfile.manifest";
-	    fi'
-	  ;;
-	*)
-	  # g++
-	  # _LT_TAGVAR(hardcode_libdir_flag_spec, CXX) is actually meaningless,
-	  # as there is no search path for DLLs.
-	  hardcode_libdir_flag_spec_CXX='-L$libdir'
-	  export_dynamic_flag_spec_CXX='${wl}--export-all-symbols'
-	  allow_undefined_flag_CXX=unsupported
-	  always_export_symbols_CXX=no
-	  enable_shared_with_static_runtimes_CXX=yes
-
-	  if $LD --help 2>&1 | $GREP 'auto-import' > /dev/null; then
-	    archive_cmds_CXX='$CC -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-	    # If the export-symbols file already is a .def file (1st line
-	    # is EXPORTS), use it as is; otherwise, prepend...
-	    archive_expsym_cmds_CXX='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	      cp $export_symbols $output_objdir/$soname.def;
-	    else
-	      echo EXPORTS > $output_objdir/$soname.def;
-	      cat $export_symbols >> $output_objdir/$soname.def;
-	    fi~
-	    $CC -shared -nostdlib $output_objdir/$soname.def $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-	  else
-	    ld_shlibs_CXX=no
-	  fi
-	  ;;
-	esac
-	;;
-      darwin* | rhapsody*)
-
-
-  archive_cmds_need_lc_CXX=no
-  hardcode_direct_CXX=no
-  hardcode_automatic_CXX=yes
-  hardcode_shlibpath_var_CXX=unsupported
-  if test "$lt_cv_ld_force_load" = "yes"; then
-    whole_archive_flag_spec_CXX='`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience ${wl}-force_load,$conv\"; done; func_echo_all \"$new_convenience\"`'
-
-  else
-    whole_archive_flag_spec_CXX=''
-  fi
-  link_all_deplibs_CXX=yes
-  allow_undefined_flag_CXX="$_lt_dar_allow_undefined"
-  case $cc_basename in
-     ifort*) _lt_dar_can_shared=yes ;;
-     *) _lt_dar_can_shared=$GCC ;;
-  esac
-  if test "$_lt_dar_can_shared" = "yes"; then
-    output_verbose_link_cmd=func_echo_all
-    archive_cmds_CXX="\$CC -dynamiclib \$allow_undefined_flag -o \$lib \$libobjs \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring $_lt_dar_single_mod${_lt_dsymutil}"
-    module_cmds_CXX="\$CC \$allow_undefined_flag -o \$lib -bundle \$libobjs \$deplibs \$compiler_flags${_lt_dsymutil}"
-    archive_expsym_cmds_CXX="sed 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC -dynamiclib \$allow_undefined_flag -o \$lib \$libobjs \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring ${_lt_dar_single_mod}${_lt_dar_export_syms}${_lt_dsymutil}"
-    module_expsym_cmds_CXX="sed -e 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC \$allow_undefined_flag -o \$lib -bundle \$libobjs \$deplibs \$compiler_flags${_lt_dar_export_syms}${_lt_dsymutil}"
-       if test "$lt_cv_apple_cc_single_mod" != "yes"; then
-      archive_cmds_CXX="\$CC -r -keep_private_externs -nostdlib -o \${lib}-master.o \$libobjs~\$CC -dynamiclib \$allow_undefined_flag -o \$lib \${lib}-master.o \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring${_lt_dsymutil}"
-      archive_expsym_cmds_CXX="sed 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC -r -keep_private_externs -nostdlib -o \${lib}-master.o \$libobjs~\$CC -dynamiclib \$allow_undefined_flag -o \$lib \${lib}-master.o \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring${_lt_dar_export_syms}${_lt_dsymutil}"
-    fi
-
-  else
-  ld_shlibs_CXX=no
-  fi
-
-	;;
-
-      dgux*)
-        case $cc_basename in
-          ec++*)
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-          ghcx*)
-	    # Green Hills C++ Compiler
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-          *)
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-        esac
-        ;;
-
-      freebsd2.*)
-        # C++ shared libraries reported to be fairly broken before
-	# switch to ELF
-        ld_shlibs_CXX=no
-        ;;
-
-      freebsd-elf*)
-        archive_cmds_need_lc_CXX=no
-        ;;
-
-      freebsd* | dragonfly*)
-        # FreeBSD 3 and later use GNU C++ and GNU ld with standard ELF
-        # conventions
-        ld_shlibs_CXX=yes
-        ;;
-
-      gnu*)
-        ;;
-
-      haiku*)
-        archive_cmds_CXX='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-        link_all_deplibs_CXX=yes
-        ;;
-
-      hpux9*)
-        hardcode_libdir_flag_spec_CXX='${wl}+b ${wl}$libdir'
-        hardcode_libdir_separator_CXX=:
-        export_dynamic_flag_spec_CXX='${wl}-E'
-        hardcode_direct_CXX=yes
-        hardcode_minus_L_CXX=yes # Not in the search PATH,
-				             # but as the default
-				             # location of the library.
-
-        case $cc_basename in
-          CC*)
-            # FIXME: insert proper C++ library support
-            ld_shlibs_CXX=no
-            ;;
-          aCC*)
-            archive_cmds_CXX='$RM $output_objdir/$soname~$CC -b ${wl}+b ${wl}$install_libdir -o $output_objdir/$soname $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-            # Commands to make compiler produce verbose output that lists
-            # what "hidden" libraries, object files and flags are used when
-            # linking a shared library.
-            #
-            # There doesn't appear to be a way to prevent this compiler from
-            # explicitly linking system object files so we need to strip them
-            # from the output so that they don't get included in the library
-            # dependencies.
-            output_verbose_link_cmd='templist=`($CC -b $CFLAGS -v conftest.$objext 2>&1) | $EGREP "\-L"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-            ;;
-          *)
-            if test "$GXX" = yes; then
-              archive_cmds_CXX='$RM $output_objdir/$soname~$CC -shared -nostdlib $pic_flag ${wl}+b ${wl}$install_libdir -o $output_objdir/$soname $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-            else
-              # FIXME: insert proper C++ library support
-              ld_shlibs_CXX=no
-            fi
-            ;;
-        esac
-        ;;
-
-      hpux10*|hpux11*)
-        if test $with_gnu_ld = no; then
-	  hardcode_libdir_flag_spec_CXX='${wl}+b ${wl}$libdir'
-	  hardcode_libdir_separator_CXX=:
-
-          case $host_cpu in
-            hppa*64*|ia64*)
-              ;;
-            *)
-	      export_dynamic_flag_spec_CXX='${wl}-E'
-              ;;
-          esac
-        fi
-        case $host_cpu in
-          hppa*64*|ia64*)
-            hardcode_direct_CXX=no
-            hardcode_shlibpath_var_CXX=no
-            ;;
-          *)
-            hardcode_direct_CXX=yes
-            hardcode_direct_absolute_CXX=yes
-            hardcode_minus_L_CXX=yes # Not in the search PATH,
-					         # but as the default
-					         # location of the library.
-            ;;
-        esac
-
-        case $cc_basename in
-          CC*)
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-          aCC*)
-	    case $host_cpu in
-	      hppa*64*)
-	        archive_cmds_CXX='$CC -b ${wl}+h ${wl}$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	        ;;
-	      ia64*)
-	        archive_cmds_CXX='$CC -b ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	        ;;
-	      *)
-	        archive_cmds_CXX='$CC -b ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	        ;;
-	    esac
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`($CC -b $CFLAGS -v conftest.$objext 2>&1) | $GREP "\-L"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-	    ;;
-          *)
-	    if test "$GXX" = yes; then
-	      if test $with_gnu_ld = no; then
-	        case $host_cpu in
-	          hppa*64*)
-	            archive_cmds_CXX='$CC -shared -nostdlib -fPIC ${wl}+h ${wl}$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	            ;;
-	          ia64*)
-	            archive_cmds_CXX='$CC -shared -nostdlib $pic_flag ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	            ;;
-	          *)
-	            archive_cmds_CXX='$CC -shared -nostdlib $pic_flag ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	            ;;
-	        esac
-	      fi
-	    else
-	      # FIXME: insert proper C++ library support
-	      ld_shlibs_CXX=no
-	    fi
-	    ;;
-        esac
-        ;;
-
-      interix[3-9]*)
-	hardcode_direct_CXX=no
-	hardcode_shlibpath_var_CXX=no
-	hardcode_libdir_flag_spec_CXX='${wl}-rpath,$libdir'
-	export_dynamic_flag_spec_CXX='${wl}-E'
-	# Hack: On Interix 3.x, we cannot compile PIC because of a broken gcc.
-	# Instead, shared libraries are loaded at an image base (0x10000000 by
-	# default) and relocated if they conflict, which is a slow very memory
-	# consuming and fragmenting process.  To avoid this, we pick a random,
-	# 256 KiB-aligned image base between 0x50000000 and 0x6FFC0000 at link
-	# time.  Moving up from 0x10000000 also allows more sbrk(2) space.
-	archive_cmds_CXX='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-	archive_expsym_cmds_CXX='sed "s,^,_," $export_symbols >$output_objdir/$soname.expsym~$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--retain-symbols-file,$output_objdir/$soname.expsym ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-	;;
-      irix5* | irix6*)
-        case $cc_basename in
-          CC*)
-	    # SGI C++
-	    archive_cmds_CXX='$CC -shared -all -multigot $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-
-	    # Archives containing C++ object files must be created using
-	    # "CC -ar", where "CC" is the IRIX C++ compiler.  This is
-	    # necessary to make sure instantiated templates are included
-	    # in the archive.
-	    old_archive_cmds_CXX='$CC -ar -WR,-u -o $oldlib $oldobjs'
-	    ;;
-          *)
-	    if test "$GXX" = yes; then
-	      if test "$with_gnu_ld" = no; then
-	        archive_cmds_CXX='$CC -shared $pic_flag -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-	      else
-	        archive_cmds_CXX='$CC -shared $pic_flag -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` -o $lib'
-	      fi
-	    fi
-	    link_all_deplibs_CXX=yes
-	    ;;
-        esac
-        hardcode_libdir_flag_spec_CXX='${wl}-rpath ${wl}$libdir'
-        hardcode_libdir_separator_CXX=:
-        inherit_rpath_CXX=yes
-        ;;
-
-      linux* | k*bsd*-gnu | kopensolaris*-gnu)
-        case $cc_basename in
-          KCC*)
-	    # Kuck and Associates, Inc. (KAI) C++ Compiler
-
-	    # KCC will only create a shared library if the output file
-	    # ends with ".so" (or ".sl" for HP-UX), so rename the library
-	    # to its proper name (with version) after linking.
-	    archive_cmds_CXX='tempext=`echo $shared_ext | $SED -e '\''s/\([^()0-9A-Za-z{}]\)/\\\\\1/g'\''`; templib=`echo $lib | $SED -e "s/\${tempext}\..*/.so/"`; $CC $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags --soname $soname -o \$templib; mv \$templib $lib'
-	    archive_expsym_cmds_CXX='tempext=`echo $shared_ext | $SED -e '\''s/\([^()0-9A-Za-z{}]\)/\\\\\1/g'\''`; templib=`echo $lib | $SED -e "s/\${tempext}\..*/.so/"`; $CC $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags --soname $soname -o \$templib ${wl}-retain-symbols-file,$export_symbols; mv \$templib $lib'
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`$CC $CFLAGS -v conftest.$objext -o libconftest$shared_ext 2>&1 | $GREP "ld"`; rm -f libconftest$shared_ext; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-
-	    hardcode_libdir_flag_spec_CXX='${wl}-rpath,$libdir'
-	    export_dynamic_flag_spec_CXX='${wl}--export-dynamic'
-
-	    # Archives containing C++ object files must be created using
-	    # "CC -Bstatic", where "CC" is the KAI C++ compiler.
-	    old_archive_cmds_CXX='$CC -Bstatic -o $oldlib $oldobjs'
-	    ;;
-	  icpc* | ecpc* )
-	    # Intel C++
-	    with_gnu_ld=yes
-	    # version 8.0 and above of icpc choke on multiply defined symbols
-	    # if we add $predep_objects and $postdep_objects, however 7.1 and
-	    # earlier do not add the objects themselves.
-	    case `$CC -V 2>&1` in
-	      *"Version 7."*)
-	        archive_cmds_CXX='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname -o $lib'
-		archive_expsym_cmds_CXX='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-		;;
-	      *)  # Version 8.0 or newer
-	        tmp_idyn=
-	        case $host_cpu in
-		  ia64*) tmp_idyn=' -i_dynamic';;
-		esac
-	        archive_cmds_CXX='$CC -shared'"$tmp_idyn"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-		archive_expsym_cmds_CXX='$CC -shared'"$tmp_idyn"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-		;;
-	    esac
-	    archive_cmds_need_lc_CXX=no
-	    hardcode_libdir_flag_spec_CXX='${wl}-rpath,$libdir'
-	    export_dynamic_flag_spec_CXX='${wl}--export-dynamic'
-	    whole_archive_flag_spec_CXX='${wl}--whole-archive$convenience ${wl}--no-whole-archive'
-	    ;;
-          pgCC* | pgcpp*)
-            # Portland Group C++ compiler
-	    case `$CC -V` in
-	    *pgCC\ [1-5].* | *pgcpp\ [1-5].*)
-	      prelink_cmds_CXX='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $objs $libobjs $compile_deplibs~
-		compile_command="$compile_command `find $tpldir -name \*.o | sort | $NL2SP`"'
-	      old_archive_cmds_CXX='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $oldobjs$old_deplibs~
-		$AR $AR_FLAGS $oldlib$oldobjs$old_deplibs `find $tpldir -name \*.o | sort | $NL2SP`~
-		$RANLIB $oldlib'
-	      archive_cmds_CXX='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $predep_objects $libobjs $deplibs $convenience $postdep_objects~
-		$CC -shared $pic_flag $predep_objects $libobjs $deplibs `find $tpldir -name \*.o | sort | $NL2SP` $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname -o $lib'
-	      archive_expsym_cmds_CXX='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $predep_objects $libobjs $deplibs $convenience $postdep_objects~
-		$CC -shared $pic_flag $predep_objects $libobjs $deplibs `find $tpldir -name \*.o | sort | $NL2SP` $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname ${wl}-retain-symbols-file ${wl}$export_symbols -o $lib'
-	      ;;
-	    *) # Version 6 and above use weak symbols
-	      archive_cmds_CXX='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname -o $lib'
-	      archive_expsym_cmds_CXX='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname ${wl}-retain-symbols-file ${wl}$export_symbols -o $lib'
-	      ;;
-	    esac
-
-	    hardcode_libdir_flag_spec_CXX='${wl}--rpath ${wl}$libdir'
-	    export_dynamic_flag_spec_CXX='${wl}--export-dynamic'
-	    whole_archive_flag_spec_CXX='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-            ;;
-	  cxx*)
-	    # Compaq C++
-	    archive_cmds_CXX='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	    archive_expsym_cmds_CXX='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname  -o $lib ${wl}-retain-symbols-file $wl$export_symbols'
-
-	    runpath_var=LD_RUN_PATH
-	    hardcode_libdir_flag_spec_CXX='-rpath $libdir'
-	    hardcode_libdir_separator_CXX=:
-
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP "ld"`; templist=`func_echo_all "$templist" | $SED "s/\(^.*ld.*\)\( .*ld .*$\)/\1/"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "X$list" | $Xsed'
-	    ;;
-	  xl* | mpixl* | bgxl*)
-	    # IBM XL 8.0 on PPC, with GNU ld
-	    hardcode_libdir_flag_spec_CXX='${wl}-rpath ${wl}$libdir'
-	    export_dynamic_flag_spec_CXX='${wl}--export-dynamic'
-	    archive_cmds_CXX='$CC -qmkshrobj $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	    if test "x$supports_anon_versioning" = xyes; then
-	      archive_expsym_cmds_CXX='echo "{ global:" > $output_objdir/$libname.ver~
-		cat $export_symbols | sed -e "s/\(.*\)/\1;/" >> $output_objdir/$libname.ver~
-		echo "local: *; };" >> $output_objdir/$libname.ver~
-		$CC -qmkshrobj $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-version-script ${wl}$output_objdir/$libname.ver -o $lib'
-	    fi
-	    ;;
-	  *)
-	    case `$CC -V 2>&1 | sed 5q` in
-	    *Sun\ C*)
-	      # Sun C++ 5.9
-	      no_undefined_flag_CXX=' -zdefs'
-	      archive_cmds_CXX='$CC -G${allow_undefined_flag} -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	      archive_expsym_cmds_CXX='$CC -G${allow_undefined_flag} -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-retain-symbols-file ${wl}$export_symbols'
-	      hardcode_libdir_flag_spec_CXX='-R$libdir'
-	      whole_archive_flag_spec_CXX='${wl}--whole-archive`new_convenience=; for conv in $convenience\"\"; do test -z \"$conv\" || new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	      compiler_needs_object_CXX=yes
-
-	      # Not sure whether something based on
-	      # $CC $CFLAGS -v conftest.$objext -o libconftest$shared_ext 2>&1
-	      # would be better.
-	      output_verbose_link_cmd='func_echo_all'
-
-	      # Archives containing C++ object files must be created using
-	      # "CC -xar", where "CC" is the Sun C++ compiler.  This is
-	      # necessary to make sure instantiated templates are included
-	      # in the archive.
-	      old_archive_cmds_CXX='$CC -xar -o $oldlib $oldobjs'
-	      ;;
-	    esac
-	    ;;
-	esac
-	;;
-
-      lynxos*)
-        # FIXME: insert proper C++ library support
-	ld_shlibs_CXX=no
-	;;
-
-      m88k*)
-        # FIXME: insert proper C++ library support
-        ld_shlibs_CXX=no
-	;;
-
-      mvs*)
-        case $cc_basename in
-          cxx*)
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-	  *)
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-	esac
-	;;
-
-      netbsd*)
-        if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-	  archive_cmds_CXX='$LD -Bshareable  -o $lib $predep_objects $libobjs $deplibs $postdep_objects $linker_flags'
-	  wlarc=
-	  hardcode_libdir_flag_spec_CXX='-R$libdir'
-	  hardcode_direct_CXX=yes
-	  hardcode_shlibpath_var_CXX=no
-	fi
-	# Workaround some broken pre-1.5 toolchains
-	output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP conftest.$objext | $SED -e "s:-lgcc -lc -lgcc::"'
-	;;
-
-      *nto* | *qnx*)
-        ld_shlibs_CXX=yes
-	;;
-
-      openbsd2*)
-        # C++ shared libraries are fairly broken
-	ld_shlibs_CXX=no
-	;;
-
-      openbsd*)
-	if test -f /usr/libexec/ld.so; then
-	  hardcode_direct_CXX=yes
-	  hardcode_shlibpath_var_CXX=no
-	  hardcode_direct_absolute_CXX=yes
-	  archive_cmds_CXX='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $lib'
-	  hardcode_libdir_flag_spec_CXX='${wl}-rpath,$libdir'
-	  if test -z "`echo __ELF__ | $CC -E - | grep __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-	    archive_expsym_cmds_CXX='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-retain-symbols-file,$export_symbols -o $lib'
-	    export_dynamic_flag_spec_CXX='${wl}-E'
-	    whole_archive_flag_spec_CXX="$wlarc"'--whole-archive$convenience '"$wlarc"'--no-whole-archive'
-	  fi
-	  output_verbose_link_cmd=func_echo_all
-	else
-	  ld_shlibs_CXX=no
-	fi
-	;;
-
-      osf3* | osf4* | osf5*)
-        case $cc_basename in
-          KCC*)
-	    # Kuck and Associates, Inc. (KAI) C++ Compiler
-
-	    # KCC will only create a shared library if the output file
-	    # ends with ".so" (or ".sl" for HP-UX), so rename the library
-	    # to its proper name (with version) after linking.
-	    archive_cmds_CXX='tempext=`echo $shared_ext | $SED -e '\''s/\([^()0-9A-Za-z{}]\)/\\\\\1/g'\''`; templib=`echo "$lib" | $SED -e "s/\${tempext}\..*/.so/"`; $CC $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags --soname $soname -o \$templib; mv \$templib $lib'
-
-	    hardcode_libdir_flag_spec_CXX='${wl}-rpath,$libdir'
-	    hardcode_libdir_separator_CXX=:
-
-	    # Archives containing C++ object files must be created using
-	    # the KAI C++ compiler.
-	    case $host in
-	      osf3*) old_archive_cmds_CXX='$CC -Bstatic -o $oldlib $oldobjs' ;;
-	      *) old_archive_cmds_CXX='$CC -o $oldlib $oldobjs' ;;
-	    esac
-	    ;;
-          RCC*)
-	    # Rational C++ 2.4.1
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-          cxx*)
-	    case $host in
-	      osf3*)
-	        allow_undefined_flag_CXX=' ${wl}-expect_unresolved ${wl}\*'
-	        archive_cmds_CXX='$CC -shared${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $soname `test -n "$verstring" && func_echo_all "${wl}-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	        hardcode_libdir_flag_spec_CXX='${wl}-rpath ${wl}$libdir'
-		;;
-	      *)
-	        allow_undefined_flag_CXX=' -expect_unresolved \*'
-	        archive_cmds_CXX='$CC -shared${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -msym -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	        archive_expsym_cmds_CXX='for i in `cat $export_symbols`; do printf "%s %s\\n" -exported_symbol "\$i" >> $lib.exp; done~
-	          echo "-hidden">> $lib.exp~
-	          $CC -shared$allow_undefined_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -msym -soname $soname ${wl}-input ${wl}$lib.exp  `test -n "$verstring" && $ECHO "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib~
-	          $RM $lib.exp'
-	        hardcode_libdir_flag_spec_CXX='-rpath $libdir'
-		;;
-	    esac
-
-	    hardcode_libdir_separator_CXX=:
-
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP "ld" | $GREP -v "ld:"`; templist=`func_echo_all "$templist" | $SED "s/\(^.*ld.*\)\( .*ld.*$\)/\1/"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-	    ;;
-	  *)
-	    if test "$GXX" = yes && test "$with_gnu_ld" = no; then
-	      allow_undefined_flag_CXX=' ${wl}-expect_unresolved ${wl}\*'
-	      case $host in
-	        osf3*)
-	          archive_cmds_CXX='$CC -shared -nostdlib ${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-		  ;;
-	        *)
-	          archive_cmds_CXX='$CC -shared $pic_flag -nostdlib ${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-msym ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-		  ;;
-	      esac
-
-	      hardcode_libdir_flag_spec_CXX='${wl}-rpath ${wl}$libdir'
-	      hardcode_libdir_separator_CXX=:
-
-	      # Commands to make compiler produce verbose output that lists
-	      # what "hidden" libraries, object files and flags are used when
-	      # linking a shared library.
-	      output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-
-	    else
-	      # FIXME: insert proper C++ library support
-	      ld_shlibs_CXX=no
-	    fi
-	    ;;
-        esac
-        ;;
-
-      psos*)
-        # FIXME: insert proper C++ library support
-        ld_shlibs_CXX=no
-        ;;
-
-      sunos4*)
-        case $cc_basename in
-          CC*)
-	    # Sun C++ 4.x
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-          lcc*)
-	    # Lucid
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-          *)
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-        esac
-        ;;
-
-      solaris*)
-        case $cc_basename in
-          CC* | sunCC*)
-	    # Sun C++ 4.2, 5.x and Centerline C++
-            archive_cmds_need_lc_CXX=yes
-	    no_undefined_flag_CXX=' -zdefs'
-	    archive_cmds_CXX='$CC -G${allow_undefined_flag}  -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	    archive_expsym_cmds_CXX='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	      $CC -G${allow_undefined_flag} ${wl}-M ${wl}$lib.exp -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~$RM $lib.exp'
-
-	    hardcode_libdir_flag_spec_CXX='-R$libdir'
-	    hardcode_shlibpath_var_CXX=no
-	    case $host_os in
-	      solaris2.[0-5] | solaris2.[0-5].*) ;;
-	      *)
-		# The compiler driver will combine and reorder linker options,
-		# but understands `-z linker_flag'.
-	        # Supported since Solaris 2.6 (maybe 2.5.1?)
-		whole_archive_flag_spec_CXX='-z allextract$convenience -z defaultextract'
-	        ;;
-	    esac
-	    link_all_deplibs_CXX=yes
-
-	    output_verbose_link_cmd='func_echo_all'
-
-	    # Archives containing C++ object files must be created using
-	    # "CC -xar", where "CC" is the Sun C++ compiler.  This is
-	    # necessary to make sure instantiated templates are included
-	    # in the archive.
-	    old_archive_cmds_CXX='$CC -xar -o $oldlib $oldobjs'
-	    ;;
-          gcx*)
-	    # Green Hills C++ Compiler
-	    archive_cmds_CXX='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-h $wl$soname -o $lib'
-
-	    # The C++ compiler must be used to create the archive.
-	    old_archive_cmds_CXX='$CC $LDFLAGS -archive -o $oldlib $oldobjs'
-	    ;;
-          *)
-	    # GNU C++ compiler with Solaris linker
-	    if test "$GXX" = yes && test "$with_gnu_ld" = no; then
-	      no_undefined_flag_CXX=' ${wl}-z ${wl}defs'
-	      if $CC --version | $GREP -v '^2\.7' > /dev/null; then
-	        archive_cmds_CXX='$CC -shared $pic_flag -nostdlib $LDFLAGS $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-h $wl$soname -o $lib'
-	        archive_expsym_cmds_CXX='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-		  $CC -shared $pic_flag -nostdlib ${wl}-M $wl$lib.exp -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~$RM $lib.exp'
-
-	        # Commands to make compiler produce verbose output that lists
-	        # what "hidden" libraries, object files and flags are used when
-	        # linking a shared library.
-	        output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-	      else
-	        # g++ 2.7 appears to require `-G' NOT `-shared' on this
-	        # platform.
-	        archive_cmds_CXX='$CC -G -nostdlib $LDFLAGS $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-h $wl$soname -o $lib'
-	        archive_expsym_cmds_CXX='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-		  $CC -G -nostdlib ${wl}-M $wl$lib.exp -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~$RM $lib.exp'
-
-	        # Commands to make compiler produce verbose output that lists
-	        # what "hidden" libraries, object files and flags are used when
-	        # linking a shared library.
-	        output_verbose_link_cmd='$CC -G $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-	      fi
-
-	      hardcode_libdir_flag_spec_CXX='${wl}-R $wl$libdir'
-	      case $host_os in
-		solaris2.[0-5] | solaris2.[0-5].*) ;;
-		*)
-		  whole_archive_flag_spec_CXX='${wl}-z ${wl}allextract$convenience ${wl}-z ${wl}defaultextract'
-		  ;;
-	      esac
-	    fi
-	    ;;
-        esac
-        ;;
-
-    sysv4*uw2* | sysv5OpenUNIX* | sysv5UnixWare7.[01].[10]* | unixware7* | sco3.2v5.0.[024]*)
-      no_undefined_flag_CXX='${wl}-z,text'
-      archive_cmds_need_lc_CXX=no
-      hardcode_shlibpath_var_CXX=no
-      runpath_var='LD_RUN_PATH'
-
-      case $cc_basename in
-        CC*)
-	  archive_cmds_CXX='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  archive_expsym_cmds_CXX='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	*)
-	  archive_cmds_CXX='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  archive_expsym_cmds_CXX='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-      esac
-      ;;
-
-      sysv5* | sco3.2v5* | sco5v6*)
-	# Note: We can NOT use -z defs as we might desire, because we do not
-	# link with -lc, and that would cause any symbols used from libc to
-	# always be unresolved, which means just about no library would
-	# ever link correctly.  If we're not using GNU ld we use -z text
-	# though, which does catch some bad symbols but isn't as heavy-handed
-	# as -z defs.
-	no_undefined_flag_CXX='${wl}-z,text'
-	allow_undefined_flag_CXX='${wl}-z,nodefs'
-	archive_cmds_need_lc_CXX=no
-	hardcode_shlibpath_var_CXX=no
-	hardcode_libdir_flag_spec_CXX='${wl}-R,$libdir'
-	hardcode_libdir_separator_CXX=':'
-	link_all_deplibs_CXX=yes
-	export_dynamic_flag_spec_CXX='${wl}-Bexport'
-	runpath_var='LD_RUN_PATH'
-
-	case $cc_basename in
-          CC*)
-	    archive_cmds_CXX='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    archive_expsym_cmds_CXX='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    old_archive_cmds_CXX='$CC -Tprelink_objects $oldobjs~
-	      '"$old_archive_cmds_CXX"
-	    reload_cmds_CXX='$CC -Tprelink_objects $reload_objs~
-	      '"$reload_cmds_CXX"
-	    ;;
-	  *)
-	    archive_cmds_CXX='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    archive_expsym_cmds_CXX='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    ;;
-	esac
-      ;;
-
-      tandem*)
-        case $cc_basename in
-          NCC*)
-	    # NonStop-UX NCC 3.20
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-          *)
-	    # FIXME: insert proper C++ library support
-	    ld_shlibs_CXX=no
-	    ;;
-        esac
-        ;;
-
-      vxworks*)
-        # FIXME: insert proper C++ library support
-        ld_shlibs_CXX=no
-        ;;
-
-      *)
-        # FIXME: insert proper C++ library support
-        ld_shlibs_CXX=no
-        ;;
-    esac
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ld_shlibs_CXX" >&5
-$as_echo "$ld_shlibs_CXX" >&6; }
-    test "$ld_shlibs_CXX" = no && can_build_shared=no
-
-    GCC_CXX="$GXX"
-    LD_CXX="$LD"
-
-    ## CAVEAT EMPTOR:
-    ## There is no encapsulation within the following macros, do not change
-    ## the running order or otherwise move them around unless you know exactly
-    ## what you are doing...
-    # Dependencies to place before and after the object being linked:
-predep_objects_CXX=
-postdep_objects_CXX=
-predeps_CXX=
-postdeps_CXX=
-compiler_lib_search_path_CXX=
-
-cat > conftest.$ac_ext <<_LT_EOF
-class Foo
-{
-public:
-  Foo (void) { a = 0; }
-private:
-  int a;
-};
-_LT_EOF
-
-
-_lt_libdeps_save_CFLAGS=$CFLAGS
-case "$CC $CFLAGS " in #(
-*\ -flto*\ *) CFLAGS="$CFLAGS -fno-lto" ;;
-*\ -fwhopr*\ *) CFLAGS="$CFLAGS -fno-whopr" ;;
-*\ -fuse-linker-plugin*\ *) CFLAGS="$CFLAGS -fno-use-linker-plugin" ;;
-esac
-
-if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }; then
-  # Parse the compiler output and extract the necessary
-  # objects, libraries and library flags.
-
-  # Sentinel used to keep track of whether or not we are before
-  # the conftest object file.
-  pre_test_object_deps_done=no
-
-  for p in `eval "$output_verbose_link_cmd"`; do
-    case ${prev}${p} in
-
-    -L* | -R* | -l*)
-       # Some compilers place space between "-{L,R}" and the path.
-       # Remove the space.
-       if test $p = "-L" ||
-          test $p = "-R"; then
-	 prev=$p
-	 continue
-       fi
-
-       # Expand the sysroot to ease extracting the directories later.
-       if test -z "$prev"; then
-         case $p in
-         -L*) func_stripname_cnf '-L' '' "$p"; prev=-L; p=$func_stripname_result ;;
-         -R*) func_stripname_cnf '-R' '' "$p"; prev=-R; p=$func_stripname_result ;;
-         -l*) func_stripname_cnf '-l' '' "$p"; prev=-l; p=$func_stripname_result ;;
-         esac
-       fi
-       case $p in
-       =*) func_stripname_cnf '=' '' "$p"; p=$lt_sysroot$func_stripname_result ;;
-       esac
-       if test "$pre_test_object_deps_done" = no; then
-	 case ${prev} in
-	 -L | -R)
-	   # Internal compiler library paths should come after those
-	   # provided the user.  The postdeps already come after the
-	   # user supplied libs so there is no need to process them.
-	   if test -z "$compiler_lib_search_path_CXX"; then
-	     compiler_lib_search_path_CXX="${prev}${p}"
-	   else
-	     compiler_lib_search_path_CXX="${compiler_lib_search_path_CXX} ${prev}${p}"
-	   fi
-	   ;;
-	 # The "-l" case would never come before the object being
-	 # linked, so don't bother handling this case.
-	 esac
-       else
-	 if test -z "$postdeps_CXX"; then
-	   postdeps_CXX="${prev}${p}"
-	 else
-	   postdeps_CXX="${postdeps_CXX} ${prev}${p}"
-	 fi
-       fi
-       prev=
-       ;;
-
-    *.lto.$objext) ;; # Ignore GCC LTO objects
-    *.$objext)
-       # This assumes that the test object file only shows up
-       # once in the compiler output.
-       if test "$p" = "conftest.$objext"; then
-	 pre_test_object_deps_done=yes
-	 continue
-       fi
-
-       if test "$pre_test_object_deps_done" = no; then
-	 if test -z "$predep_objects_CXX"; then
-	   predep_objects_CXX="$p"
-	 else
-	   predep_objects_CXX="$predep_objects_CXX $p"
-	 fi
-       else
-	 if test -z "$postdep_objects_CXX"; then
-	   postdep_objects_CXX="$p"
-	 else
-	   postdep_objects_CXX="$postdep_objects_CXX $p"
-	 fi
-       fi
-       ;;
-
-    *) ;; # Ignore the rest.
-
-    esac
-  done
-
-  # Clean up.
-  rm -f a.out a.exe
-else
-  echo "libtool.m4: error: problem compiling CXX test program"
-fi
-
-$RM -f confest.$objext
-CFLAGS=$_lt_libdeps_save_CFLAGS
-
-# PORTME: override above test on systems where it is broken
-case $host_os in
-interix[3-9]*)
-  # Interix 3.5 installs completely hosed .la files for C++, so rather than
-  # hack all around it, let's just trust "g++" to DTRT.
-  predep_objects_CXX=
-  postdep_objects_CXX=
-  postdeps_CXX=
-  ;;
-
-linux*)
-  case `$CC -V 2>&1 | sed 5q` in
-  *Sun\ C*)
-    # Sun C++ 5.9
-
-    # The more standards-conforming stlport4 library is
-    # incompatible with the Cstd library. Avoid specifying
-    # it if it's in CXXFLAGS. Ignore libCrun as
-    # -library=stlport4 depends on it.
-    case " $CXX $CXXFLAGS " in
-    *" -library=stlport4 "*)
-      solaris_use_stlport4=yes
-      ;;
-    esac
-
-    if test "$solaris_use_stlport4" != yes; then
-      postdeps_CXX='-library=Cstd -library=Crun'
-    fi
-    ;;
-  esac
-  ;;
-
-solaris*)
-  case $cc_basename in
-  CC* | sunCC*)
-    # The more standards-conforming stlport4 library is
-    # incompatible with the Cstd library. Avoid specifying
-    # it if it's in CXXFLAGS. Ignore libCrun as
-    # -library=stlport4 depends on it.
-    case " $CXX $CXXFLAGS " in
-    *" -library=stlport4 "*)
-      solaris_use_stlport4=yes
-      ;;
-    esac
-
-    # Adding this requires a known-good setup of shared libraries for
-    # Sun compiler versions before 5.6, else PIC objects from an old
-    # archive will be linked into the output, leading to subtle bugs.
-    if test "$solaris_use_stlport4" != yes; then
-      postdeps_CXX='-library=Cstd -library=Crun'
-    fi
-    ;;
-  esac
-  ;;
-esac
-
-
-case " $postdeps_CXX " in
-*" -lc "*) archive_cmds_need_lc_CXX=no ;;
-esac
- compiler_lib_search_dirs_CXX=
-if test -n "${compiler_lib_search_path_CXX}"; then
- compiler_lib_search_dirs_CXX=`echo " ${compiler_lib_search_path_CXX}" | ${SED} -e 's! -L! !g' -e 's!^ !!'`
-fi
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-    lt_prog_compiler_wl_CXX=
-lt_prog_compiler_pic_CXX=
-lt_prog_compiler_static_CXX=
-
-
-  # C++ specific cases for pic, static, wl, etc.
-  if test "$GXX" = yes; then
-    lt_prog_compiler_wl_CXX='-Wl,'
-    lt_prog_compiler_static_CXX='-static'
-
-    case $host_os in
-    aix*)
-      # All AIX code is PIC.
-      if test "$host_cpu" = ia64; then
-	# AIX 5 now supports IA64 processor
-	lt_prog_compiler_static_CXX='-Bstatic'
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            lt_prog_compiler_pic_CXX='-fPIC'
-        ;;
-      m68k)
-            # FIXME: we need at least 68020 code to build shared libraries, but
-            # adding the `-m68020' flag to GCC prevents building anything better,
-            # like `-m68040'.
-            lt_prog_compiler_pic_CXX='-m68020 -resident32 -malways-restore-a4'
-        ;;
-      esac
-      ;;
-
-    beos* | irix5* | irix6* | nonstopux* | osf3* | osf4* | osf5*)
-      # PIC is the default for these OSes.
-      ;;
-    mingw* | cygwin* | os2* | pw32* | cegcc*)
-      # This hack is so that the source file can tell whether it is being
-      # built for inclusion in a dll (and should export symbols for example).
-      # Although the cygwin gcc ignores -fPIC, still need this for old-style
-      # (--disable-auto-import) libraries
-      lt_prog_compiler_pic_CXX='-DDLL_EXPORT'
-      ;;
-    darwin* | rhapsody*)
-      # PIC is the default on this platform
-      # Common symbols not allowed in MH_DYLIB files
-      lt_prog_compiler_pic_CXX='-fno-common'
-      ;;
-    *djgpp*)
-      # DJGPP does not support shared libraries at all
-      lt_prog_compiler_pic_CXX=
-      ;;
-    haiku*)
-      # PIC is the default for Haiku.
-      # The "-static" flag exists, but is broken.
-      lt_prog_compiler_static_CXX=
-      ;;
-    interix[3-9]*)
-      # Interix 3.x gcc -fpic/-fPIC options generate broken code.
-      # Instead, we relocate shared libraries at runtime.
-      ;;
-    sysv4*MP*)
-      if test -d /usr/nec; then
-	lt_prog_compiler_pic_CXX=-Kconform_pic
-      fi
-      ;;
-    hpux*)
-      # PIC is the default for 64-bit PA HP-UX, but not for 32-bit
-      # PA HP-UX.  On IA64 HP-UX, PIC is the default but the pic flag
-      # sets the default TLS model and affects inlining.
-      case $host_cpu in
-      hppa*64*)
-	;;
-      *)
-	lt_prog_compiler_pic_CXX='-fPIC'
-	;;
-      esac
-      ;;
-    *qnx* | *nto*)
-      # QNX uses GNU C++, but need to define -shared option too, otherwise
-      # it will coredump.
-      lt_prog_compiler_pic_CXX='-fPIC -shared'
-      ;;
-    *)
-      lt_prog_compiler_pic_CXX='-fPIC'
-      ;;
-    esac
-  else
-    case $host_os in
-      aix[4-9]*)
-	# All AIX code is PIC.
-	if test "$host_cpu" = ia64; then
-	  # AIX 5 now supports IA64 processor
-	  lt_prog_compiler_static_CXX='-Bstatic'
-	else
-	  lt_prog_compiler_static_CXX='-bnso -bI:/lib/syscalls.exp'
-	fi
-	;;
-      chorus*)
-	case $cc_basename in
-	cxch68*)
-	  # Green Hills C++ Compiler
-	  # _LT_TAGVAR(lt_prog_compiler_static, CXX)="--no_auto_instantiation -u __main -u __premain -u _abort -r $COOL_DIR/lib/libOrb.a $MVME_DIR/lib/CC/libC.a $MVME_DIR/lib/classix/libcx.s.a"
-	  ;;
-	esac
-	;;
-      mingw* | cygwin* | os2* | pw32* | cegcc*)
-	# This hack is so that the source file can tell whether it is being
-	# built for inclusion in a dll (and should export symbols for example).
-	lt_prog_compiler_pic_CXX='-DDLL_EXPORT'
-	;;
-      dgux*)
-	case $cc_basename in
-	  ec++*)
-	    lt_prog_compiler_pic_CXX='-KPIC'
-	    ;;
-	  ghcx*)
-	    # Green Hills C++ Compiler
-	    lt_prog_compiler_pic_CXX='-pic'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      freebsd* | dragonfly*)
-	# FreeBSD uses GNU C++
-	;;
-      hpux9* | hpux10* | hpux11*)
-	case $cc_basename in
-	  CC*)
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_static_CXX='${wl}-a ${wl}archive'
-	    if test "$host_cpu" != ia64; then
-	      lt_prog_compiler_pic_CXX='+Z'
-	    fi
-	    ;;
-	  aCC*)
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_static_CXX='${wl}-a ${wl}archive'
-	    case $host_cpu in
-	    hppa*64*|ia64*)
-	      # +Z the default
-	      ;;
-	    *)
-	      lt_prog_compiler_pic_CXX='+Z'
-	      ;;
-	    esac
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      interix*)
-	# This is c89, which is MS Visual C++ (no shared libs)
-	# Anyone wants to do a port?
-	;;
-      irix5* | irix6* | nonstopux*)
-	case $cc_basename in
-	  CC*)
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_static_CXX='-non_shared'
-	    # CC pic flag -KPIC is the default.
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      linux* | k*bsd*-gnu | kopensolaris*-gnu)
-	case $cc_basename in
-	  KCC*)
-	    # KAI C++ Compiler
-	    lt_prog_compiler_wl_CXX='--backend -Wl,'
-	    lt_prog_compiler_pic_CXX='-fPIC'
-	    ;;
-	  ecpc* )
-	    # old Intel C++ for x86_64 which still supported -KPIC.
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_pic_CXX='-KPIC'
-	    lt_prog_compiler_static_CXX='-static'
-	    ;;
-	  icpc* )
-	    # Intel C++, used to be incompatible with GCC.
-	    # ICC 10 doesn't accept -KPIC any more.
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_pic_CXX='-fPIC'
-	    lt_prog_compiler_static_CXX='-static'
-	    ;;
-	  pgCC* | pgcpp*)
-	    # Portland Group C++ compiler
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_pic_CXX='-fpic'
-	    lt_prog_compiler_static_CXX='-Bstatic'
-	    ;;
-	  cxx*)
-	    # Compaq C++
-	    # Make sure the PIC flag is empty.  It appears that all Alpha
-	    # Linux and Compaq Tru64 Unix objects are PIC.
-	    lt_prog_compiler_pic_CXX=
-	    lt_prog_compiler_static_CXX='-non_shared'
-	    ;;
-	  xlc* | xlC* | bgxl[cC]* | mpixl[cC]*)
-	    # IBM XL 8.0, 9.0 on PPC and BlueGene
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_pic_CXX='-qpic'
-	    lt_prog_compiler_static_CXX='-qstaticlink'
-	    ;;
-	  *)
-	    case `$CC -V 2>&1 | sed 5q` in
-	    *Sun\ C*)
-	      # Sun C++ 5.9
-	      lt_prog_compiler_pic_CXX='-KPIC'
-	      lt_prog_compiler_static_CXX='-Bstatic'
-	      lt_prog_compiler_wl_CXX='-Qoption ld '
-	      ;;
-	    esac
-	    ;;
-	esac
-	;;
-      lynxos*)
-	;;
-      m88k*)
-	;;
-      mvs*)
-	case $cc_basename in
-	  cxx*)
-	    lt_prog_compiler_pic_CXX='-W c,exportall'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      netbsd*)
-	;;
-      *qnx* | *nto*)
-        # QNX uses GNU C++, but need to define -shared option too, otherwise
-        # it will coredump.
-        lt_prog_compiler_pic_CXX='-fPIC -shared'
-        ;;
-      osf3* | osf4* | osf5*)
-	case $cc_basename in
-	  KCC*)
-	    lt_prog_compiler_wl_CXX='--backend -Wl,'
-	    ;;
-	  RCC*)
-	    # Rational C++ 2.4.1
-	    lt_prog_compiler_pic_CXX='-pic'
-	    ;;
-	  cxx*)
-	    # Digital/Compaq C++
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    # Make sure the PIC flag is empty.  It appears that all Alpha
-	    # Linux and Compaq Tru64 Unix objects are PIC.
-	    lt_prog_compiler_pic_CXX=
-	    lt_prog_compiler_static_CXX='-non_shared'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      psos*)
-	;;
-      solaris*)
-	case $cc_basename in
-	  CC* | sunCC*)
-	    # Sun C++ 4.2, 5.x and Centerline C++
-	    lt_prog_compiler_pic_CXX='-KPIC'
-	    lt_prog_compiler_static_CXX='-Bstatic'
-	    lt_prog_compiler_wl_CXX='-Qoption ld '
-	    ;;
-	  gcx*)
-	    # Green Hills C++ Compiler
-	    lt_prog_compiler_pic_CXX='-PIC'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      sunos4*)
-	case $cc_basename in
-	  CC*)
-	    # Sun C++ 4.x
-	    lt_prog_compiler_pic_CXX='-pic'
-	    lt_prog_compiler_static_CXX='-Bstatic'
-	    ;;
-	  lcc*)
-	    # Lucid
-	    lt_prog_compiler_pic_CXX='-pic'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      sysv5* | unixware* | sco3.2v5* | sco5v6* | OpenUNIX*)
-	case $cc_basename in
-	  CC*)
-	    lt_prog_compiler_wl_CXX='-Wl,'
-	    lt_prog_compiler_pic_CXX='-KPIC'
-	    lt_prog_compiler_static_CXX='-Bstatic'
-	    ;;
-	esac
-	;;
-      tandem*)
-	case $cc_basename in
-	  NCC*)
-	    # NonStop-UX NCC 3.20
-	    lt_prog_compiler_pic_CXX='-KPIC'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      vxworks*)
-	;;
-      *)
-	lt_prog_compiler_can_build_shared_CXX=no
-	;;
-    esac
-  fi
-
-case $host_os in
-  # For platforms which do not support PIC, -DPIC is meaningless:
-  *djgpp*)
-    lt_prog_compiler_pic_CXX=
-    ;;
-  *)
-    lt_prog_compiler_pic_CXX="$lt_prog_compiler_pic_CXX -DPIC"
-    ;;
-esac
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $compiler option to produce PIC" >&5
-$as_echo_n "checking for $compiler option to produce PIC... " >&6; }
-if test "${lt_cv_prog_compiler_pic_CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_pic_CXX=$lt_prog_compiler_pic_CXX
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_pic_CXX" >&5
-$as_echo "$lt_cv_prog_compiler_pic_CXX" >&6; }
-lt_prog_compiler_pic_CXX=$lt_cv_prog_compiler_pic_CXX
-
-#
-# Check to make sure the PIC flag actually works.
-#
-if test -n "$lt_prog_compiler_pic_CXX"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler PIC flag $lt_prog_compiler_pic_CXX works" >&5
-$as_echo_n "checking if $compiler PIC flag $lt_prog_compiler_pic_CXX works... " >&6; }
-if test "${lt_cv_prog_compiler_pic_works_CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_pic_works_CXX=no
-   ac_outfile=conftest.$ac_objext
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-   lt_compiler_flag="$lt_prog_compiler_pic_CXX -DPIC"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   # The option is referenced via a variable to avoid confusing sed.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [^ ]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&5)
-   (eval "$lt_compile" 2>conftest.err)
-   ac_status=$?
-   cat conftest.err >&5
-   echo "$as_me:$LINENO: \$? = $ac_status" >&5
-   if (exit $ac_status) && test -s "$ac_outfile"; then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings other than the usual output.
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' >conftest.exp
-     $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-     if test ! -s conftest.er2 || diff conftest.exp conftest.er2 >/dev/null; then
-       lt_cv_prog_compiler_pic_works_CXX=yes
-     fi
-   fi
-   $RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_pic_works_CXX" >&5
-$as_echo "$lt_cv_prog_compiler_pic_works_CXX" >&6; }
-
-if test x"$lt_cv_prog_compiler_pic_works_CXX" = xyes; then
-    case $lt_prog_compiler_pic_CXX in
-     "" | " "*) ;;
-     *) lt_prog_compiler_pic_CXX=" $lt_prog_compiler_pic_CXX" ;;
-     esac
-else
-    lt_prog_compiler_pic_CXX=
-     lt_prog_compiler_can_build_shared_CXX=no
-fi
-
-fi
-
-
-
-
-
-#
-# Check to make sure the static flag actually works.
-#
-wl=$lt_prog_compiler_wl_CXX eval lt_tmp_static_flag=\"$lt_prog_compiler_static_CXX\"
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler static flag $lt_tmp_static_flag works" >&5
-$as_echo_n "checking if $compiler static flag $lt_tmp_static_flag works... " >&6; }
-if test "${lt_cv_prog_compiler_static_works_CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_static_works_CXX=no
-   save_LDFLAGS="$LDFLAGS"
-   LDFLAGS="$LDFLAGS $lt_tmp_static_flag"
-   echo "$lt_simple_link_test_code" > conftest.$ac_ext
-   if (eval $ac_link 2>conftest.err) && test -s conftest$ac_exeext; then
-     # The linker can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     if test -s conftest.err; then
-       # Append any errors to the config.log.
-       cat conftest.err 1>&5
-       $ECHO "$_lt_linker_boilerplate" | $SED '/^$/d' > conftest.exp
-       $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-       if diff conftest.exp conftest.er2 >/dev/null; then
-         lt_cv_prog_compiler_static_works_CXX=yes
-       fi
-     else
-       lt_cv_prog_compiler_static_works_CXX=yes
-     fi
-   fi
-   $RM -r conftest*
-   LDFLAGS="$save_LDFLAGS"
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_static_works_CXX" >&5
-$as_echo "$lt_cv_prog_compiler_static_works_CXX" >&6; }
-
-if test x"$lt_cv_prog_compiler_static_works_CXX" = xyes; then
-    :
-else
-    lt_prog_compiler_static_CXX=
-fi
-
-
-
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler supports -c -o file.$ac_objext" >&5
-$as_echo_n "checking if $compiler supports -c -o file.$ac_objext... " >&6; }
-if test "${lt_cv_prog_compiler_c_o_CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_c_o_CXX=no
-   $RM -r conftest 2>/dev/null
-   mkdir conftest
-   cd conftest
-   mkdir out
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-   lt_compiler_flag="-o out/conftest2.$ac_objext"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [^ ]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&5)
-   (eval "$lt_compile" 2>out/conftest.err)
-   ac_status=$?
-   cat out/conftest.err >&5
-   echo "$as_me:$LINENO: \$? = $ac_status" >&5
-   if (exit $ac_status) && test -s out/conftest2.$ac_objext
-   then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' > out/conftest.exp
-     $SED '/^$/d; /^ *+/d' out/conftest.err >out/conftest.er2
-     if test ! -s out/conftest.er2 || diff out/conftest.exp out/conftest.er2 >/dev/null; then
-       lt_cv_prog_compiler_c_o_CXX=yes
-     fi
-   fi
-   chmod u+w . 2>&5
-   $RM conftest*
-   # SGI C++ compiler will create directory out/ii_files/ for
-   # template instantiation
-   test -d out/ii_files && $RM out/ii_files/* && rmdir out/ii_files
-   $RM out/* && rmdir out
-   cd ..
-   $RM -r conftest
-   $RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_c_o_CXX" >&5
-$as_echo "$lt_cv_prog_compiler_c_o_CXX" >&6; }
-
-
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking if $compiler supports -c -o file.$ac_objext" >&5
-$as_echo_n "checking if $compiler supports -c -o file.$ac_objext... " >&6; }
-if test "${lt_cv_prog_compiler_c_o_CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_prog_compiler_c_o_CXX=no
-   $RM -r conftest 2>/dev/null
-   mkdir conftest
-   cd conftest
-   mkdir out
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-   lt_compiler_flag="-o out/conftest2.$ac_objext"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [^ ]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&5)
-   (eval "$lt_compile" 2>out/conftest.err)
-   ac_status=$?
-   cat out/conftest.err >&5
-   echo "$as_me:$LINENO: \$? = $ac_status" >&5
-   if (exit $ac_status) && test -s out/conftest2.$ac_objext
-   then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' > out/conftest.exp
-     $SED '/^$/d; /^ *+/d' out/conftest.err >out/conftest.er2
-     if test ! -s out/conftest.er2 || diff out/conftest.exp out/conftest.er2 >/dev/null; then
-       lt_cv_prog_compiler_c_o_CXX=yes
-     fi
-   fi
-   chmod u+w . 2>&5
-   $RM conftest*
-   # SGI C++ compiler will create directory out/ii_files/ for
-   # template instantiation
-   test -d out/ii_files && $RM out/ii_files/* && rmdir out/ii_files
-   $RM out/* && rmdir out
-   cd ..
-   $RM -r conftest
-   $RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_prog_compiler_c_o_CXX" >&5
-$as_echo "$lt_cv_prog_compiler_c_o_CXX" >&6; }
-
-
-
-
-hard_links="nottested"
-if test "$lt_cv_prog_compiler_c_o_CXX" = no && test "$need_locks" != no; then
-  # do not overwrite the value of need_locks provided by the user
-  { $as_echo "$as_me:${as_lineno-$LINENO}: checking if we can lock with hard links" >&5
-$as_echo_n "checking if we can lock with hard links... " >&6; }
-  hard_links=yes
-  $RM conftest*
-  ln conftest.a conftest.b 2>/dev/null && hard_links=no
-  touch conftest.a
-  ln conftest.a conftest.b 2>&5 || hard_links=no
-  ln conftest.a conftest.b 2>/dev/null && hard_links=no
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $hard_links" >&5
-$as_echo "$hard_links" >&6; }
-  if test "$hard_links" = no; then
-    { $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: \`$CC' does not support \`-c -o', so \`make -j' may be unsafe" >&5
-$as_echo "$as_me: WARNING: \`$CC' does not support \`-c -o', so \`make -j' may be unsafe" >&2;}
-    need_locks=warn
-  fi
-else
-  need_locks=no
-fi
-
-
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether the $compiler linker ($LD) supports shared libraries" >&5
-$as_echo_n "checking whether the $compiler linker ($LD) supports shared libraries... " >&6; }
-
-  export_symbols_cmds_CXX='$NM $libobjs $convenience | $global_symbol_pipe | $SED '\''s/.* //'\'' | sort | uniq > $export_symbols'
-  exclude_expsyms_CXX='_GLOBAL_OFFSET_TABLE_|_GLOBAL__F[ID]_.*'
-  case $host_os in
-  aix[4-9]*)
-    # If we're using GNU nm, then we don't want the "-C" option.
-    # -C means demangle to AIX nm, but means don't demangle with GNU nm
-    # Also, AIX nm treats weak defined symbols like other global defined
-    # symbols, whereas GNU nm marks them as "W".
-    if $NM -V 2>&1 | $GREP 'GNU' > /dev/null; then
-      export_symbols_cmds_CXX='$NM -Bpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B") || (\$ 2 == "W")) && (substr(\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-    else
-      export_symbols_cmds_CXX='$NM -BCpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B")) && (substr(\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-    fi
-    ;;
-  pw32*)
-    export_symbols_cmds_CXX="$ltdll_cmds"
-    ;;
-  cygwin* | mingw* | cegcc*)
-    case $cc_basename in
-    cl*)
-      exclude_expsyms_CXX='_NULL_IMPORT_DESCRIPTOR|_IMPORT_DESCRIPTOR_.*'
-      ;;
-    *)
-      export_symbols_cmds_CXX='$NM $libobjs $convenience | $global_symbol_pipe | $SED -e '\''/^[BCDGRS][ ]/s/.*[ ]\([^ ]*\)/\1 DATA/;s/^.*[ ]__nm__\([^ ]*\)[ ][^ ]*/\1 DATA/;/^I[ ]/d;/^[AITW][ ]/s/.* //'\'' | sort | uniq > $export_symbols'
-      exclude_expsyms_CXX='[_]+GLOBAL_OFFSET_TABLE_|[_]+GLOBAL__[FID]_.*|[_]+head_[A-Za-z0-9_]+_dll|[A-Za-z0-9_]+_dll_iname'
-      ;;
-    esac
-    ;;
-  *)
-    export_symbols_cmds_CXX='$NM $libobjs $convenience | $global_symbol_pipe | $SED '\''s/.* //'\'' | sort | uniq > $export_symbols'
-    ;;
-  esac
-
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ld_shlibs_CXX" >&5
-$as_echo "$ld_shlibs_CXX" >&6; }
-test "$ld_shlibs_CXX" = no && can_build_shared=no
-
-with_gnu_ld_CXX=$with_gnu_ld
-
-
-
-
-
-
-#
-# Do we need to explicitly link libc?
-#
-case "x$archive_cmds_need_lc_CXX" in
-x|xyes)
-  # Assume -lc should be added
-  archive_cmds_need_lc_CXX=yes
-
-  if test "$enable_shared" = yes && test "$GCC" = yes; then
-    case $archive_cmds_CXX in
-    *'~'*)
-      # FIXME: we may have to deal with multi-command sequences.
-      ;;
-    '$CC '*)
-      # Test whether the compiler implicitly links with -lc since on some
-      # systems, -lgcc has to come before -lc. If gcc already passes -lc
-      # to ld, don't add -lc before -lgcc.
-      { $as_echo "$as_me:${as_lineno-$LINENO}: checking whether -lc should be explicitly linked in" >&5
-$as_echo_n "checking whether -lc should be explicitly linked in... " >&6; }
-if test "${lt_cv_archive_cmds_need_lc_CXX+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  $RM conftest*
-	echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-	if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$ac_compile\""; } >&5
-  (eval $ac_compile) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; } 2>conftest.err; then
-	  soname=conftest
-	  lib=conftest
-	  libobjs=conftest.$ac_objext
-	  deplibs=
-	  wl=$lt_prog_compiler_wl_CXX
-	  pic_flag=$lt_prog_compiler_pic_CXX
-	  compiler_flags=-v
-	  linker_flags=-v
-	  verstring=
-	  output_objdir=.
-	  libname=conftest
-	  lt_save_allow_undefined_flag=$allow_undefined_flag_CXX
-	  allow_undefined_flag_CXX=
-	  if { { eval echo "\"\$as_me\":${as_lineno-$LINENO}: \"$archive_cmds_CXX 2\>\&1 \| $GREP \" -lc \" \>/dev/null 2\>\&1\""; } >&5
-  (eval $archive_cmds_CXX 2\>\&1 \| $GREP \" -lc \" \>/dev/null 2\>\&1) 2>&5
-  ac_status=$?
-  $as_echo "$as_me:${as_lineno-$LINENO}: \$? = $ac_status" >&5
-  test $ac_status = 0; }
-	  then
-	    lt_cv_archive_cmds_need_lc_CXX=no
-	  else
-	    lt_cv_archive_cmds_need_lc_CXX=yes
-	  fi
-	  allow_undefined_flag_CXX=$lt_save_allow_undefined_flag
-	else
-	  cat conftest.err 1>&5
-	fi
-	$RM conftest*
-
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $lt_cv_archive_cmds_need_lc_CXX" >&5
-$as_echo "$lt_cv_archive_cmds_need_lc_CXX" >&6; }
-      archive_cmds_need_lc_CXX=$lt_cv_archive_cmds_need_lc_CXX
-      ;;
-    esac
-  fi
-  ;;
-esac
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking dynamic linker characteristics" >&5
-$as_echo_n "checking dynamic linker characteristics... " >&6; }
-
-library_names_spec=
-libname_spec='lib$name'
-soname_spec=
-shrext_cmds=".so"
-postinstall_cmds=
-postuninstall_cmds=
-finish_cmds=
-finish_eval=
-shlibpath_var=
-shlibpath_overrides_runpath=unknown
-version_type=none
-dynamic_linker="$host_os ld.so"
-sys_lib_dlsearch_path_spec="/lib /usr/lib"
-need_lib_prefix=unknown
-hardcode_into_libs=no
-
-# when you set need_version to no, make sure it does not cause -set_version
-# flags to be left without arguments
-need_version=unknown
-
-case $host_os in
-aix3*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix $libname.a'
-  shlibpath_var=LIBPATH
-
-  # AIX 3 has no versioning support, so we append a major version to the name.
-  soname_spec='${libname}${release}${shared_ext}$major'
-  ;;
-
-aix[4-9]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  hardcode_into_libs=yes
-  if test "$host_cpu" = ia64; then
-    # AIX 5 supports IA64
-    library_names_spec='${libname}${release}${shared_ext}$major ${libname}${release}${shared_ext}$versuffix $libname${shared_ext}'
-    shlibpath_var=LD_LIBRARY_PATH
-  else
-    # With GCC up to 2.95.x, collect2 would create an import file
-    # for dependence libraries.  The import file would start with
-    # the line `#! .'.  This would cause the generated library to
-    # depend on `.', always an invalid library.  This was fixed in
-    # development snapshots of GCC prior to 3.0.
-    case $host_os in
-      aix4 | aix4.[01] | aix4.[01].*)
-      if { echo '#if __GNUC__ > 2 || (__GNUC__ == 2 && __GNUC_MINOR__ >= 97)'
-	   echo ' yes '
-	   echo '#endif'; } | ${CC} -E - | $GREP yes > /dev/null; then
-	:
-      else
-	can_build_shared=no
-      fi
-      ;;
-    esac
-    # AIX (on Power*) has no versioning support, so currently we can not hardcode correct
-    # soname into executable. Probably we can add versioning support to
-    # collect2, so additional links can be useful in future.
-    if test "$aix_use_runtimelinking" = yes; then
-      # If using run time linking (on AIX 4.2 or later) use lib<name>.so
-      # instead of lib<name>.a to let people know that these are not
-      # typical AIX shared libraries.
-      library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    else
-      # We preserve .a as extension for shared libraries through AIX4.2
-      # and later when we are not doing run time linking.
-      library_names_spec='${libname}${release}.a $libname.a'
-      soname_spec='${libname}${release}${shared_ext}$major'
-    fi
-    shlibpath_var=LIBPATH
-  fi
-  ;;
-
-amigaos*)
-  case $host_cpu in
-  powerpc)
-    # Since July 2007 AmigaOS4 officially supports .so libraries.
-    # When compiling the executable, add -use-dynld -Lsobjs: to the compileline.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    ;;
-  m68k)
-    library_names_spec='$libname.ixlibrary $libname.a'
-    # Create ${libname}_ixlibrary.a entries in /sys/libs.
-    finish_eval='for lib in `ls $libdir/*.ixlibrary 2>/dev/null`; do libname=`func_echo_all "$lib" | $SED '\''s%^.*/\([^/]*\)\.ixlibrary$%\1%'\''`; test $RM /sys/libs/${libname}_ixlibrary.a; $show "cd /sys/libs && $LN_S $lib ${libname}_ixlibrary.a"; cd /sys/libs && $LN_S $lib ${libname}_ixlibrary.a || exit 1; done'
-    ;;
-  esac
-  ;;
-
-beos*)
-  library_names_spec='${libname}${shared_ext}'
-  dynamic_linker="$host_os ld.so"
-  shlibpath_var=LIBRARY_PATH
-  ;;
-
-bsdi[45]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  sys_lib_search_path_spec="/shlib /usr/lib /usr/X11/lib /usr/contrib/lib /lib /usr/local/lib"
-  sys_lib_dlsearch_path_spec="/shlib /usr/lib /usr/local/lib"
-  # the default ld.so.conf also contains /usr/contrib/lib and
-  # /usr/X11R6/lib (/usr/X11 is a link to /usr/X11R6), but let us allow
-  # libtool to hard-code these into programs
-  ;;
-
-cygwin* | mingw* | pw32* | cegcc*)
-  version_type=windows
-  shrext_cmds=".dll"
-  need_version=no
-  need_lib_prefix=no
-
-  case $GCC,$cc_basename in
-  yes,*)
-    # gcc
-    library_names_spec='$libname.dll.a'
-    # DLL is installed to $(libdir)/../bin by postinstall_cmds
-    postinstall_cmds='base_file=`basename \${file}`~
-      dlpath=`$SHELL 2>&1 -c '\''. $dir/'\''\${base_file}'\''i; echo \$dlname'\''`~
-      dldir=$destdir/`dirname \$dlpath`~
-      test -d \$dldir || mkdir -p \$dldir~
-      $install_prog $dir/$dlname \$dldir/$dlname~
-      chmod a+x \$dldir/$dlname~
-      if test -n '\''$stripme'\'' && test -n '\''$striplib'\''; then
-        eval '\''$striplib \$dldir/$dlname'\'' || exit \$?;
-      fi'
-    postuninstall_cmds='dldll=`$SHELL 2>&1 -c '\''. $file; echo \$dlname'\''`~
-      dlpath=$dir/\$dldll~
-       $RM \$dlpath'
-    shlibpath_overrides_runpath=yes
-
-    case $host_os in
-    cygwin*)
-      # Cygwin DLLs use 'cyg' prefix rather than 'lib'
-      soname_spec='`echo ${libname} | sed -e 's/^lib/cyg/'``echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-
-      ;;
-    mingw* | cegcc*)
-      # MinGW DLLs use traditional 'lib' prefix
-      soname_spec='${libname}`echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-      ;;
-    pw32*)
-      # pw32 DLLs use 'pw' prefix rather than 'lib'
-      library_names_spec='`echo ${libname} | sed -e 's/^lib/pw/'``echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-      ;;
-    esac
-    dynamic_linker='Win32 ld.exe'
-    ;;
-
-  *,cl*)
-    # Native MSVC
-    libname_spec='$name'
-    soname_spec='${libname}`echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext}'
-    library_names_spec='${libname}.dll.lib'
-
-    case $build_os in
-    mingw*)
-      sys_lib_search_path_spec=
-      lt_save_ifs=$IFS
-      IFS=';'
-      for lt_path in $LIB
-      do
-        IFS=$lt_save_ifs
-        # Let DOS variable expansion print the short 8.3 style file name.
-        lt_path=`cd "$lt_path" 2>/dev/null && cmd //C "for %i in (".") do @echo %~si"`
-        sys_lib_search_path_spec="$sys_lib_search_path_spec $lt_path"
-      done
-      IFS=$lt_save_ifs
-      # Convert to MSYS style.
-      sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | sed -e 's|\\\\|/|g' -e 's| \\([a-zA-Z]\\):| /\\1|g' -e 's|^ ||'`
-      ;;
-    cygwin*)
-      # Convert to unix form, then to dos form, then back to unix form
-      # but this time dos style (no spaces!) so that the unix form looks
-      # like /cygdrive/c/PROGRA~1:/cygdr...
-      sys_lib_search_path_spec=`cygpath --path --unix "$LIB"`
-      sys_lib_search_path_spec=`cygpath --path --dos "$sys_lib_search_path_spec" 2>/dev/null`
-      sys_lib_search_path_spec=`cygpath --path --unix "$sys_lib_search_path_spec" | $SED -e "s/$PATH_SEPARATOR/ /g"`
-      ;;
-    *)
-      sys_lib_search_path_spec="$LIB"
-      if $ECHO "$sys_lib_search_path_spec" | $GREP ';[c-zC-Z]:/' >/dev/null; then
-        # It is most probably a Windows format PATH.
-        sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | $SED -e 's/;/ /g'`
-      else
-        sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | $SED -e "s/$PATH_SEPARATOR/ /g"`
-      fi
-      # FIXME: find the short name or the path components, as spaces are
-      # common. (e.g. "Program Files" -> "PROGRA~1")
-      ;;
-    esac
-
-    # DLL is installed to $(libdir)/../bin by postinstall_cmds
-    postinstall_cmds='base_file=`basename \${file}`~
-      dlpath=`$SHELL 2>&1 -c '\''. $dir/'\''\${base_file}'\''i; echo \$dlname'\''`~
-      dldir=$destdir/`dirname \$dlpath`~
-      test -d \$dldir || mkdir -p \$dldir~
-      $install_prog $dir/$dlname \$dldir/$dlname'
-    postuninstall_cmds='dldll=`$SHELL 2>&1 -c '\''. $file; echo \$dlname'\''`~
-      dlpath=$dir/\$dldll~
-       $RM \$dlpath'
-    shlibpath_overrides_runpath=yes
-    dynamic_linker='Win32 link.exe'
-    ;;
-
-  *)
-    # Assume MSVC wrapper
-    library_names_spec='${libname}`echo ${release} | $SED -e 's/[.]/-/g'`${versuffix}${shared_ext} $libname.lib'
-    dynamic_linker='Win32 ld.exe'
-    ;;
-  esac
-  # FIXME: first we should search . and the directory the executable is in
-  shlibpath_var=PATH
-  ;;
-
-darwin* | rhapsody*)
-  dynamic_linker="$host_os dyld"
-  version_type=darwin
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${major}$shared_ext ${libname}$shared_ext'
-  soname_spec='${libname}${release}${major}$shared_ext'
-  shlibpath_overrides_runpath=yes
-  shlibpath_var=DYLD_LIBRARY_PATH
-  shrext_cmds='`test .$module = .yes && echo .so || echo .dylib`'
-
-  sys_lib_dlsearch_path_spec='/usr/local/lib /lib /usr/lib'
-  ;;
-
-dgux*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname$shared_ext'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  ;;
-
-freebsd* | dragonfly*)
-  # DragonFly does not have aout.  When/if they implement a new
-  # versioning mechanism, adjust this.
-  if test -x /usr/bin/objformat; then
-    objformat=`/usr/bin/objformat`
-  else
-    case $host_os in
-    freebsd[23].*) objformat=aout ;;
-    *) objformat=elf ;;
-    esac
-  fi
-  version_type=freebsd-$objformat
-  case $version_type in
-    freebsd-elf*)
-      library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext} $libname${shared_ext}'
-      need_version=no
-      need_lib_prefix=no
-      ;;
-    freebsd-*)
-      library_names_spec='${libname}${release}${shared_ext}$versuffix $libname${shared_ext}$versuffix'
-      need_version=yes
-      ;;
-  esac
-  shlibpath_var=LD_LIBRARY_PATH
-  case $host_os in
-  freebsd2.*)
-    shlibpath_overrides_runpath=yes
-    ;;
-  freebsd3.[01]* | freebsdelf3.[01]*)
-    shlibpath_overrides_runpath=yes
-    hardcode_into_libs=yes
-    ;;
-  freebsd3.[2-9]* | freebsdelf3.[2-9]* | \
-  freebsd4.[0-5] | freebsdelf4.[0-5] | freebsd4.1.1 | freebsdelf4.1.1)
-    shlibpath_overrides_runpath=no
-    hardcode_into_libs=yes
-    ;;
-  *) # from 4.6 on, and DragonFly
-    shlibpath_overrides_runpath=yes
-    hardcode_into_libs=yes
-    ;;
-  esac
-  ;;
-
-gnu*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}${major} ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-haiku*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  dynamic_linker="$host_os runtime_loader"
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}${major} ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  sys_lib_dlsearch_path_spec='/boot/home/config/lib /boot/common/lib /boot/system/lib'
-  hardcode_into_libs=yes
-  ;;
-
-hpux9* | hpux10* | hpux11*)
-  # Give a soname corresponding to the major version so that dld.sl refuses to
-  # link against other versions.
-  version_type=sunos
-  need_lib_prefix=no
-  need_version=no
-  case $host_cpu in
-  ia64*)
-    shrext_cmds='.so'
-    hardcode_into_libs=yes
-    dynamic_linker="$host_os dld.so"
-    shlibpath_var=LD_LIBRARY_PATH
-    shlibpath_overrides_runpath=yes # Unless +noenvvar is specified.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    if test "X$HPUX_IA64_MODE" = X32; then
-      sys_lib_search_path_spec="/usr/lib/hpux32 /usr/local/lib/hpux32 /usr/local/lib"
-    else
-      sys_lib_search_path_spec="/usr/lib/hpux64 /usr/local/lib/hpux64"
-    fi
-    sys_lib_dlsearch_path_spec=$sys_lib_search_path_spec
-    ;;
-  hppa*64*)
-    shrext_cmds='.sl'
-    hardcode_into_libs=yes
-    dynamic_linker="$host_os dld.sl"
-    shlibpath_var=LD_LIBRARY_PATH # How should we handle SHLIB_PATH
-    shlibpath_overrides_runpath=yes # Unless +noenvvar is specified.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    sys_lib_search_path_spec="/usr/lib/pa20_64 /usr/ccs/lib/pa20_64"
-    sys_lib_dlsearch_path_spec=$sys_lib_search_path_spec
-    ;;
-  *)
-    shrext_cmds='.sl'
-    dynamic_linker="$host_os dld.sl"
-    shlibpath_var=SHLIB_PATH
-    shlibpath_overrides_runpath=no # +s is required to enable SHLIB_PATH
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    ;;
-  esac
-  # HP-UX runs *really* slowly unless shared libraries are mode 555, ...
-  postinstall_cmds='chmod 555 $lib'
-  # or fails outright, so override atomically:
-  install_override_mode=555
-  ;;
-
-interix[3-9]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  dynamic_linker='Interix 3.x ld.so.1 (PE, like ELF)'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-irix5* | irix6* | nonstopux*)
-  case $host_os in
-    nonstopux*) version_type=nonstopux ;;
-    *)
-	if test "$lt_cv_prog_gnu_ld" = yes; then
-		version_type=linux # correct to gnu/linux during the next big refactor
-	else
-		version_type=irix
-	fi ;;
-  esac
-  need_lib_prefix=no
-  need_version=no
-  soname_spec='${libname}${release}${shared_ext}$major'
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${release}${shared_ext} $libname${shared_ext}'
-  case $host_os in
-  irix5* | nonstopux*)
-    libsuff= shlibsuff=
-    ;;
-  *)
-    case $LD in # libtool.m4 will add one of these switches to LD
-    *-32|*"-32 "|*-melf32bsmip|*"-melf32bsmip ")
-      libsuff= shlibsuff= libmagic=32-bit;;
-    *-n32|*"-n32 "|*-melf32bmipn32|*"-melf32bmipn32 ")
-      libsuff=32 shlibsuff=N32 libmagic=N32;;
-    *-64|*"-64 "|*-melf64bmip|*"-melf64bmip ")
-      libsuff=64 shlibsuff=64 libmagic=64-bit;;
-    *) libsuff= shlibsuff= libmagic=never-match;;
-    esac
-    ;;
-  esac
-  shlibpath_var=LD_LIBRARY${shlibsuff}_PATH
-  shlibpath_overrides_runpath=no
-  sys_lib_search_path_spec="/usr/lib${libsuff} /lib${libsuff} /usr/local/lib${libsuff}"
-  sys_lib_dlsearch_path_spec="/usr/lib${libsuff} /lib${libsuff}"
-  hardcode_into_libs=yes
-  ;;
-
-# No shared lib support for Linux oldld, aout, or coff.
-linux*oldld* | linux*aout* | linux*coff*)
-  dynamic_linker=no
-  ;;
-
-# This must be glibc/ELF.
-linux* | k*bsd*-gnu | kopensolaris*-gnu)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig -n $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-
-  # Some binutils ld are patched to set DT_RUNPATH
-  if test "${lt_cv_shlibpath_overrides_runpath+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  lt_cv_shlibpath_overrides_runpath=no
-    save_LDFLAGS=$LDFLAGS
-    save_libdir=$libdir
-    eval "libdir=/foo; wl=\"$lt_prog_compiler_wl_CXX\"; \
-	 LDFLAGS=\"\$LDFLAGS $hardcode_libdir_flag_spec_CXX\""
-    cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_cxx_try_link "$LINENO"; then :
-  if  ($OBJDUMP -p conftest$ac_exeext) 2>/dev/null | grep "RUNPATH.*$libdir" >/dev/null; then :
-  lt_cv_shlibpath_overrides_runpath=yes
-fi
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-    LDFLAGS=$save_LDFLAGS
-    libdir=$save_libdir
-
-fi
-
-  shlibpath_overrides_runpath=$lt_cv_shlibpath_overrides_runpath
-
-  # This implies no fast_install, which is unacceptable.
-  # Some rework will be needed to allow for fast_install
-  # before this can be enabled.
-  hardcode_into_libs=yes
-
-  # Append ld.so.conf contents to the search path
-  if test -f /etc/ld.so.conf; then
-    lt_ld_extra=`awk '/^include / { system(sprintf("cd /etc; cat %s 2>/dev/null", \$2)); skip = 1; } { if (!skip) print \$0; skip = 0; }' < /etc/ld.so.conf | $SED -e 's/#.*//;/^[	 ]*hwcap[	 ]/d;s/[:,	]/ /g;s/=[^=]*$//;s/=[^= ]* / /g;s/"//g;/^$/d' | tr '\n' ' '`
-    sys_lib_dlsearch_path_spec="/lib /usr/lib $lt_ld_extra"
-  fi
-
-  # We used to test for /lib/ld.so.1 and disable shared libraries on
-  # powerpc, because MkLinux only supported shared libraries with the
-  # GNU dynamic linker.  Since this was broken with cross compilers,
-  # most powerpc-linux boxes support dynamic linking these days and
-  # people can always --disable-shared, the test was removed, and we
-  # assume the GNU/Linux dynamic linker is in use.
-  dynamic_linker='GNU/Linux ld.so'
-  ;;
-
-netbsd*)
-  version_type=sunos
-  need_lib_prefix=no
-  need_version=no
-  if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-    finish_cmds='PATH="\$PATH:/sbin" ldconfig -m $libdir'
-    dynamic_linker='NetBSD (a.out) ld.so'
-  else
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    dynamic_linker='NetBSD ld.elf_so'
-  fi
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  ;;
-
-newsos6)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  ;;
-
-*nto* | *qnx*)
-  version_type=qnx
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  dynamic_linker='ldqnx.so'
-  ;;
-
-openbsd*)
-  version_type=sunos
-  sys_lib_dlsearch_path_spec="/usr/lib"
-  need_lib_prefix=no
-  # Some older versions of OpenBSD (3.3 at least) *do* need versioned libs.
-  case $host_os in
-    openbsd3.3 | openbsd3.3.*)	need_version=yes ;;
-    *)				need_version=no  ;;
-  esac
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig -m $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  if test -z "`echo __ELF__ | $CC -E - | $GREP __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-    case $host_os in
-      openbsd2.[89] | openbsd2.[89].*)
-	shlibpath_overrides_runpath=no
-	;;
-      *)
-	shlibpath_overrides_runpath=yes
-	;;
-      esac
-  else
-    shlibpath_overrides_runpath=yes
-  fi
-  ;;
-
-os2*)
-  libname_spec='$name'
-  shrext_cmds=".dll"
-  need_lib_prefix=no
-  library_names_spec='$libname${shared_ext} $libname.a'
-  dynamic_linker='OS/2 ld.exe'
-  shlibpath_var=LIBPATH
-  ;;
-
-osf3* | osf4* | osf5*)
-  version_type=osf
-  need_lib_prefix=no
-  need_version=no
-  soname_spec='${libname}${release}${shared_ext}$major'
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  sys_lib_search_path_spec="/usr/shlib /usr/ccs/lib /usr/lib/cmplrs/cc /usr/lib /usr/local/lib /var/shlib"
-  sys_lib_dlsearch_path_spec="$sys_lib_search_path_spec"
-  ;;
-
-rdos*)
-  dynamic_linker=no
-  ;;
-
-solaris*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  # ldd complains unless libraries are executable
-  postinstall_cmds='chmod +x $lib'
-  ;;
-
-sunos4*)
-  version_type=sunos
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-  finish_cmds='PATH="\$PATH:/usr/etc" ldconfig $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  if test "$with_gnu_ld" = yes; then
-    need_lib_prefix=no
-  fi
-  need_version=yes
-  ;;
-
-sysv4 | sysv4.3*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  case $host_vendor in
-    sni)
-      shlibpath_overrides_runpath=no
-      need_lib_prefix=no
-      runpath_var=LD_RUN_PATH
-      ;;
-    siemens)
-      need_lib_prefix=no
-      ;;
-    motorola)
-      need_lib_prefix=no
-      need_version=no
-      shlibpath_overrides_runpath=no
-      sys_lib_search_path_spec='/lib /usr/lib /usr/ccs/lib'
-      ;;
-  esac
-  ;;
-
-sysv4*MP*)
-  if test -d /usr/nec ;then
-    version_type=linux # correct to gnu/linux during the next big refactor
-    library_names_spec='$libname${shared_ext}.$versuffix $libname${shared_ext}.$major $libname${shared_ext}'
-    soname_spec='$libname${shared_ext}.$major'
-    shlibpath_var=LD_LIBRARY_PATH
-  fi
-  ;;
-
-sysv5* | sco3.2v5* | sco5v6* | unixware* | OpenUNIX* | sysv4*uw2*)
-  version_type=freebsd-elf
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext} $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  if test "$with_gnu_ld" = yes; then
-    sys_lib_search_path_spec='/usr/local/lib /usr/gnu/lib /usr/ccs/lib /usr/lib /lib'
-  else
-    sys_lib_search_path_spec='/usr/ccs/lib /usr/lib'
-    case $host_os in
-      sco3.2v5*)
-        sys_lib_search_path_spec="$sys_lib_search_path_spec /lib"
-	;;
-    esac
-  fi
-  sys_lib_dlsearch_path_spec='/usr/lib'
-  ;;
-
-tpf*)
-  # TPF is a cross-target only.  Preferred cross-host = GNU/Linux.
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-uts4*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  ;;
-
-*)
-  dynamic_linker=no
-  ;;
-esac
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $dynamic_linker" >&5
-$as_echo "$dynamic_linker" >&6; }
-test "$dynamic_linker" = no && can_build_shared=no
-
-variables_saved_for_relink="PATH $shlibpath_var $runpath_var"
-if test "$GCC" = yes; then
-  variables_saved_for_relink="$variables_saved_for_relink GCC_EXEC_PREFIX COMPILER_PATH LIBRARY_PATH"
-fi
-
-if test "${lt_cv_sys_lib_search_path_spec+set}" = set; then
-  sys_lib_search_path_spec="$lt_cv_sys_lib_search_path_spec"
-fi
-if test "${lt_cv_sys_lib_dlsearch_path_spec+set}" = set; then
-  sys_lib_dlsearch_path_spec="$lt_cv_sys_lib_dlsearch_path_spec"
-fi
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-    { $as_echo "$as_me:${as_lineno-$LINENO}: checking how to hardcode library paths into programs" >&5
-$as_echo_n "checking how to hardcode library paths into programs... " >&6; }
-hardcode_action_CXX=
-if test -n "$hardcode_libdir_flag_spec_CXX" ||
-   test -n "$runpath_var_CXX" ||
-   test "X$hardcode_automatic_CXX" = "Xyes" ; then
-
-  # We can hardcode non-existent directories.
-  if test "$hardcode_direct_CXX" != no &&
-     # If the only mechanism to avoid hardcoding is shlibpath_var, we
-     # have to relink, otherwise we might link with an installed library
-     # when we should be linking with a yet-to-be-installed one
-     ## test "$_LT_TAGVAR(hardcode_shlibpath_var, CXX)" != no &&
-     test "$hardcode_minus_L_CXX" != no; then
-    # Linking always hardcodes the temporary library directory.
-    hardcode_action_CXX=relink
-  else
-    # We can link without hardcoding, and we can hardcode nonexisting dirs.
-    hardcode_action_CXX=immediate
-  fi
-else
-  # We cannot hardcode anything, or else we can only hardcode existing
-  # directories.
-  hardcode_action_CXX=unsupported
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $hardcode_action_CXX" >&5
-$as_echo "$hardcode_action_CXX" >&6; }
-
-if test "$hardcode_action_CXX" = relink ||
-   test "$inherit_rpath_CXX" = yes; then
-  # Fast installation is not supported
-  enable_fast_install=no
-elif test "$shlibpath_overrides_runpath" = yes ||
-     test "$enable_shared" = no; then
-  # Fast installation is not necessary
-  enable_fast_install=needless
-fi
-
-
-
-
-
-
-
-  fi # test -n "$compiler"
-
-  CC=$lt_save_CC
-  CFLAGS=$lt_save_CFLAGS
-  LDCXX=$LD
-  LD=$lt_save_LD
-  GCC=$lt_save_GCC
-  with_gnu_ld=$lt_save_with_gnu_ld
-  lt_cv_path_LDCXX=$lt_cv_path_LD
-  lt_cv_path_LD=$lt_save_path_LD
-  lt_cv_prog_gnu_ldcxx=$lt_cv_prog_gnu_ld
-  lt_cv_prog_gnu_ld=$lt_save_with_gnu_ld
-fi # test "$_lt_caught_CXX_error" != yes
-
-ac_ext=c
-ac_cpp='$CPP $CPPFLAGS'
-ac_compile='$CC -c $CFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CC -o conftest$ac_exeext $CFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_c_compiler_gnu
-
-
-
-############################################################################################################
-################## detect downloader wget(Linux) / curl(Mac OS)
-
-### todo: check if works as expected
-
-GETBIN=""
-GETBINPARAM=""
-
-if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}wget ", so it can be a program name with args.
-set dummy ${ac_tool_prefix}wget ; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_path_GETBIN+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  case $GETBIN in
-  [\\/]* | ?:[\\/]*)
-  ac_cv_path_GETBIN="$GETBIN" # Let the user override the test with a path.
-  ;;
-  *)
-  as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_path_GETBIN="$as_dir/$ac_word$ac_exec_ext"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-  ;;
-esac
-fi
-GETBIN=$ac_cv_path_GETBIN
-if test -n "$GETBIN"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $GETBIN" >&5
-$as_echo "$GETBIN" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_path_GETBIN"; then
-  ac_pt_GETBIN=$GETBIN
-  # Extract the first word of "wget ", so it can be a program name with args.
-set dummy wget ; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_path_ac_pt_GETBIN+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  case $ac_pt_GETBIN in
-  [\\/]* | ?:[\\/]*)
-  ac_cv_path_ac_pt_GETBIN="$ac_pt_GETBIN" # Let the user override the test with a path.
-  ;;
-  *)
-  as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_path_ac_pt_GETBIN="$as_dir/$ac_word$ac_exec_ext"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-  ;;
-esac
-fi
-ac_pt_GETBIN=$ac_cv_path_ac_pt_GETBIN
-if test -n "$ac_pt_GETBIN"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_pt_GETBIN" >&5
-$as_echo "$ac_pt_GETBIN" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_pt_GETBIN" = x; then
-    GETBIN=""
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    GETBIN=$ac_pt_GETBIN
-  fi
-else
-  GETBIN="$ac_cv_path_GETBIN"
-fi
-
-
-
-if test "$GETBIN" != ""; then
-GETBINPARAM=" -k --no-verbose --no-check-certificate "
-else
-    if test -n "$ac_tool_prefix"; then
-  # Extract the first word of "${ac_tool_prefix}curl ", so it can be a program name with args.
-set dummy ${ac_tool_prefix}curl ; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_path_GETBIN+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  case $GETBIN in
-  [\\/]* | ?:[\\/]*)
-  ac_cv_path_GETBIN="$GETBIN" # Let the user override the test with a path.
-  ;;
-  *)
-  as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_path_GETBIN="$as_dir/$ac_word$ac_exec_ext"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-  ;;
-esac
-fi
-GETBIN=$ac_cv_path_GETBIN
-if test -n "$GETBIN"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $GETBIN" >&5
-$as_echo "$GETBIN" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-
-fi
-if test -z "$ac_cv_path_GETBIN"; then
-  ac_pt_GETBIN=$GETBIN
-  # Extract the first word of "curl ", so it can be a program name with args.
-set dummy curl ; ac_word=$2
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking for $ac_word" >&5
-$as_echo_n "checking for $ac_word... " >&6; }
-if test "${ac_cv_path_ac_pt_GETBIN+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  case $ac_pt_GETBIN in
-  [\\/]* | ?:[\\/]*)
-  ac_cv_path_ac_pt_GETBIN="$ac_pt_GETBIN" # Let the user override the test with a path.
-  ;;
-  *)
-  as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-    for ac_exec_ext in '' $ac_executable_extensions; do
-  if { test -f "$as_dir/$ac_word$ac_exec_ext" && $as_test_x "$as_dir/$ac_word$ac_exec_ext"; }; then
-    ac_cv_path_ac_pt_GETBIN="$as_dir/$ac_word$ac_exec_ext"
-    $as_echo "$as_me:${as_lineno-$LINENO}: found $as_dir/$ac_word$ac_exec_ext" >&5
-    break 2
-  fi
-done
-  done
-IFS=$as_save_IFS
-
-  ;;
-esac
-fi
-ac_pt_GETBIN=$ac_cv_path_ac_pt_GETBIN
-if test -n "$ac_pt_GETBIN"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: $ac_pt_GETBIN" >&5
-$as_echo "$ac_pt_GETBIN" >&6; }
-else
-  { $as_echo "$as_me:${as_lineno-$LINENO}: result: no" >&5
-$as_echo "no" >&6; }
-fi
-
-  if test "x$ac_pt_GETBIN" = x; then
-    GETBIN=""
-  else
-    case $cross_compiling:$ac_tool_warned in
-yes:)
-{ $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: using cross tools not prefixed with host triplet" >&5
-$as_echo "$as_me: WARNING: using cross tools not prefixed with host triplet" >&2;}
-ac_tool_warned=yes ;;
-esac
-    GETBIN=$ac_pt_GETBIN
-  fi
-else
-  GETBIN="$ac_cv_path_GETBIN"
-fi
-
-    if test "$GETBIN" != ""; then
-       # see http://curl.haxx.se/docs/manpage.html for params!
-       GETBINPARAM=" -L -C - -O "
-    fi;
-fi;
-
-if test "$GETBIN" = ""; then
-   as_fn_error $? "Could not locate 'wget' or 'curl'; please install!  " "$LINENO" 5
-fi;
-
-
-
-######################################################
-
-
-# Check whether --enable-static was given.
-if test "${enable_static+set}" = set; then :
-  enableval=$enable_static;
-fi
-
-
- # Check whether --enable-shared was given.
-if test "${enable_shared+set}" = set; then :
-  enableval=$enable_shared;
-fi
-
-
-CONFIGUREPARAMS=" "
-
-if test "$enable_static" = yes; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-static "
-   #else
-   #CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-static "
-fi;
-
-if test "$enable_shared" = no; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-shared "
-   else
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-shared "
-fi;
-
-######################################################
-
-
-GAC_stack_protector_flag=""
-
-# Check for -fno-stack-protector, because we link within GAP
-{ $as_echo "$as_me:${as_lineno-$LINENO}: checking whether $CC accepts -fno-stack-protector" >&5
-$as_echo_n "checking whether $CC accepts -fno-stack-protector... " >&6; }
-if test "${ns_cv_cc__nostackprotector+set}" = set; then :
-  $as_echo_n "(cached) " >&6
-else
-  save_CFLAGS=$CFLAGS
-     CFLAGS="$CFLAGS -fno-stack-protector"
-     cat confdefs.h - <<_ACEOF >conftest.$ac_ext
-/* end confdefs.h.  */
-
-int
-main ()
-{
-
-  ;
-  return 0;
-}
-_ACEOF
-if ac_fn_c_try_link "$LINENO"; then :
-  ns_cv_cc__nostackprotector=yes
-else
-  ns_cv_cc__nostackprotector=no
-fi
-rm -f core conftest.err conftest.$ac_objext \
-    conftest$ac_exeext conftest.$ac_ext
-     CFLAGS=$save_CFLAGS
-fi
-{ $as_echo "$as_me:${as_lineno-$LINENO}: result: $ns_cv_cc__nostackprotector" >&5
-$as_echo "$ns_cv_cc__nostackprotector" >&6; }
-if test $ns_cv_cc__nostackprotector = yes; then
-     CFLAGS=" $CFLAGS -fno-stack-protector "
-     GAC_stack_protector_flag=" -p -fno-stack-protector "
-fi
-
-######################################################
-
-
-
-if test -z "$GAPDIR"; then
-    for dir in ../.. /Applications/gap4r5; do
-        if test -f $dir/sysinfo.gap; then
-            GAPDIR=$dir
-            break
-        fi
-    done
-fi
-
-
-if test -n "$CONFIGNAME"; then
-    SYSINFO="$GAPDIR/sysinfo.gap-$CONFIGNAME"
-    MAKEFILE="Makefile-$CONFIGNAME"
-    GAPPROG="$GAPDIR/bin/gap-$CONFIGNAME.sh"
-else
-    SYSINFO="$GAPDIR/sysinfo.gap"
-    MAKEFILE="Makefile"
-    GAPPROG="$GAPDIR/bin/gap.sh"
-fi
-
-if ! test -f "$SYSINFO"; then
-    as_fn_error $? "Could not locate the GAP root directory;
-        specify its location with './configure GAPDIR=DIR CONFIGNAME=NAME)'" "$LINENO" 5
-fi
-
-GAPDIR=`cd "$GAPDIR" && pwd` # make path absolute
-
-
-. "$SYSINFO"
-TARGET="$GAParch"
-
-echo checking target... "$TARGET"
-
-XTARGET="`cnf/config.guess`-$CC-`echo $TARGET | sed 's/.*-//'`"
-if test "$XTARGET" != "$GAParch_system"; then
-   { $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: The guessed target $XTARGET is not the gap target $GAParch_system. Cross your fingers" >&5
-$as_echo "$as_me: WARNING: The guessed target $XTARGET is not the gap target $GAParch_system. Cross your fingers" >&2;}
-fi
-
-
-echo checking gap executable ... "$GAPPROG"
-
-if ! test -e "$GAPPROG"; then
-    as_fn_error $? "Could not find GAP executable $GAPPROG" "$LINENO" 5
-fi
-
-
-GAC="$GAPDIR/bin/$TARGET/gac"
-
-echo checking gac compiler... $GAC
-
-if ! test -e "$GAC"; then
-    as_fn_error $? "Could not find GAP compiler $GAC" "$LINENO" 5
-fi
-
-
-################################################################
-# gmp configuration
-
-GMPDIR="$GAPDIR/bin/$TARGET/extern/gmp"
-GMPINCLUDE=""
-GMPLIB=""
-
-
-# Check whether --with-gmp was given.
-if test "${with_gmp+set}" = set; then :
-  withval=$with_gmp; if test "$withval" != gap; then GMPDIR="$withval"; fi
-
-fi
-
-
-
-# Check whether --with-gmp-include was given.
-if test "${with_gmp_include+set}" = set; then :
-  withval=$with_gmp_include; GMPINCLUDE="$withval"
-
-fi
-
-
-
-# Check whether --with-gmp-lib was given.
-if test "${with_gmp_lib+set}" = set; then :
-  withval=$with_gmp_lib; GMPLIB="$withval"
-
-fi
-
-
-if test "$GMPDIR" != yes; then
-if test "$GMPINCLUDE" == ""; then GMPINCLUDE="$GMPDIR/include"; fi
-if test "$GMPLIB" == ""; then GMPLIB="$GMPDIR/lib"; fi
-fi
-
-################################################################
-# mpfr configuration
-
-EXTERN="\$(CURDIR)/bin/$TARGET/extern"
-
-MPFRDIR="$EXTERN"
-MPFRINCLUDE=""
-MPFRLIB=""
-
-
-# Check whether --with-mpfr was given.
-if test "${with_mpfr+set}" = set; then :
-  withval=$with_mpfr; if test "$withval" != extern; then MPFRDIR="$withval"; fi
-
-fi
-
-
-
-# Check whether --with-mpfr-include was given.
-if test "${with_mpfr_include+set}" = set; then :
-  withval=$with_mpfr_include; MPFRINCLUDE="$withval"
-
-fi
-
-
-
-# Check whether --with-mpfr-lib was given.
-if test "${with_mpfr_lib+set}" = set; then :
-  withval=$with_mpfr_lib; MPFRLIB="$withval"
-
-fi
-
-
-if test "$MPFRDIR" != yes; then
-if test "$MPFRINCLUDE" == ""; then MPFRINCLUDE="$MPFRDIR/include"; fi
-if test "$MPFRLIB" == ""; then MPFRLIB="$MPFRDIR/lib"; fi
-fi
-
-################################################################
-# mpfi configuration
-
-if test "MPFRDIR" != no; then
-
-MPFIDIR="$EXTERN"
-MPFIINCLUDE=""
-MPFILIB=""
-
-
-# Check whether --with-mpfi was given.
-if test "${with_mpfi+set}" = set; then :
-  withval=$with_mpfi; if test "$withval" != extern; then MPFIDIR="$withval"; fi
-
-fi
-
-
-
-# Check whether --with-mpfi-include was given.
-if test "${with_mpfi_include+set}" = set; then :
-  withval=$with_mpfi_include; MPFIINCLUDE="$withval"
-
-fi
-
-
-
-# Check whether --with-mpfi-lib was given.
-if test "${with_mpfi_lib+set}" = set; then :
-  withval=$with_mpfi_lib; MPFILIB="$withval"
-
-fi
-
-
-if test "$MPFIDIR" != yes; then
-if test "$MPFIINCLUDE" == ""; then MPFIINCLUDE="$MPFIDIR/include"; fi
-if test "$MPFILIB" == ""; then MPFILIB="$MPFIDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# mpc configuration
-
-if test "$MPFRDIR" != no; then
-
-MPCDIR="$EXTERN"
-MPCINCLUDE=""
-MPCLIB=""
-
-
-# Check whether --with-mpc was given.
-if test "${with_mpc+set}" = set; then :
-  withval=$with_mpc; if test "$withval" != extern; then MPCDIR="$withval"; fi
-
-fi
-
-
-
-# Check whether --with-mpc-include was given.
-if test "${with_mpc_include+set}" = set; then :
-  withval=$with_mpc_include; MPCINCLUDE="$withval"
-
-fi
-
-
-
-# Check whether --with-mpc-lib was given.
-if test "${with_mpc_lib+set}" = set; then :
-  withval=$with_mpc_lib; MPCLIB="$withval"
-
-fi
-
-
-if test "$MPCDIR" != yes; then
-if test "$MPCINCLUDE" == ""; then MPCINCLUDE="$MPCDIR/include"; fi
-if test "$MPCLIB" == ""; then MPCLIB="$MPCDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# fplll configuration
-
-if test "$MPFRDIR" != no; then
-
-FPLLLDIR="$EXTERN"
-FPLLLINCLUDE=""
-FPLLLLIB=""
-
-
-# Check whether --with-fplll was given.
-if test "${with_fplll+set}" = set; then :
-  withval=$with_fplll; if test "$withval" != extern; then FPLLLDIR="$withval"; fi
-
-fi
-
-
-
-# Check whether --with-fplll-include was given.
-if test "${with_fplll_include+set}" = set; then :
-  withval=$with_fplll_include; FPLLLINCLUDE="$withval"
-
-fi
-
-
-
-# Check whether --with-fplll-lib was given.
-if test "${with_fplll_lib+set}" = set; then :
-  withval=$with_fplll_lib; FPLLLLIB="$withval"
-
-fi
-
-
-if test "$FPLLLDIR" != yes; then
-if test "$FPLLLINCLUDE" == ""; then FPLLLINCLUDE="$FPLLLDIR/include"; fi
-if test "$FPLLLLIB" == ""; then FPLLLLIB="$FPLLLDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# cxsc configuration
-
-CXSCDIR="$EXTERN"
-CXSCINCLUDE=""
-CXSCLIB=""
-
-
-# Check whether --with-cxsc was given.
-if test "${with_cxsc+set}" = set; then :
-  withval=$with_cxsc; if test "$withval" != extern; then CXSCDIR="$withval"; fi
-
-fi
-
-
-
-# Check whether --with-cxsc-include was given.
-if test "${with_cxsc_include+set}" = set; then :
-  withval=$with_cxsc_include; CXSCINCLUDE="$withval"
-
-fi
-
-
-
-# Check whether --with-cxsc-lib was given.
-if test "${with_cxsc_lib+set}" = set; then :
-  withval=$with_cxsc_lib; CXSCLIB="$withval"
-
-fi
-
-
-if test "$CXSCDIR" != yes; then
-if test "$CXSCINCLUDE" == ""; then CXSCINCLUDE="$CXSCDIR/include"; fi
-if test "$CXSCLIB" == ""; then CXSCLIB="$CXSCDIR/lib"; fi
-fi
-
-################################################################
-# make target mpfr
-
-echo using GMP directory... $GMPDIR
-echo using MPFR directory... $MPFRDIR
-echo using MPFI directory... $MPFIDIR
-echo using MPC directory... $MPCDIR
-echo using FPLLL directory... $FPLLLDIR
-echo using CXSC directory... $CXSCDIR
-
-GACFLAGS=""
-DLL_TARGET="\$(LOCALBIN)"
-LIB_TARGET=""
-
-if test "$MPFRDIR" != no; then
-
-MP_FLOAT_LIB=""
-MP_FLOAT_O="\$(LOCALBIN)/mp_float.o"
-DLL_TARGET="$DLL_TARGET \$(LOCALBIN)/mp_float.so"
-
-# check gmp presence
-if test "$GMPINCLUDE" != ""; then
-   CPPFLAGS="$CPPFLAGS -I$GMPINCLUDE"
-   GACFLAGS="$GACFLAGS -p -I$GMPINCLUDE"
-fi
-ac_fn_c_check_header_mongrel "$LINENO" "gmp.h" "ac_cv_header_gmp_h" "$ac_includes_default"
-if test "x$ac_cv_header_gmp_h" = x""yes; then :
-
-else
-  as_fn_error $? "library gmp not found. Specify its location using --with-gmp" "$LINENO" 5
-fi
-
-
-
-# buggy darwin doesn't chain the dll requirements to gmp; we include it again
-if test "$GMPLIB" != ""; then
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$GMPLIB -L -Wl,-rpath,$GMPLIB"
-fi
-MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lgmp"
-
-# check mpfr presence
-if test "$MPFRINCLUDE" != ""; then
-   CPPFLAGS="$CPPFLAGS -I$MPFRINCLUDE"
-   GACFLAGS="$GACFLAGS -p -I$MPFRINCLUDE"
-fi
-if test "$MPFRDIR" == "$EXTERN"; then
-   LIB_TARGET="$LIB_TARGET mpfrlib"
-else
-   ac_fn_c_check_header_mongrel "$LINENO" "mpfr.h" "ac_cv_header_mpfr_h" "$ac_includes_default"
-if test "x$ac_cv_header_mpfr_h" = x""yes; then :
-
-else
-  as_fn_error $? "library mpfr not found. Specify its location, or disable it using --without-mpfr" "$LINENO" 5
-fi
-
-
-fi
-GACFLAGS="$GACFLAGS -p -DWITH_MPFR"
-if test "$MPFRLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPFRLIB -L -Wl,-rpath,$MPFRLIB"; fi
-MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpfr"
-MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpfr.o"
-
-# check mpfi presence
-if test "$MPFIDIR" != no; then
-   if test "$MPFIINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$MPFIINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$MPFIINCLUDE"
-   fi
-   if test "$MPFIDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET mpfilib"
-   else
-      ac_fn_c_check_header_compile "$LINENO" "mpfi.h" "ac_cv_header_mpfi_h" "#include <mpfr.h>
-"
-if test "x$ac_cv_header_mpfi_h" = x""yes; then :
-
-else
-  as_fn_error $? "library mpfi not found. Specify its location, or disable it using --without-mpfi" "$LINENO" 5
-fi
-
-
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_MPFI"
-   if test "$MPFILIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPFILIB -L -Wl,-rpath,$MPFILIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpfi"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpfi.o"
-fi
-
-# check mpc presence
-if test "$MPCDIR" != no; then
-   if test "$MPCINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$MPCINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$MPCINCLUDE"
-   fi
-   if test "$MPCDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET mpclib"
-   else
-      ac_fn_c_check_header_compile "$LINENO" "mpc.h" "ac_cv_header_mpc_h" "#include <mpfr.h>
-"
-if test "x$ac_cv_header_mpc_h" = x""yes; then :
-
-else
-  as_fn_error $? "library mpc not found. Specify its location, or disable it using --without-mpc" "$LINENO" 5
-fi
-
-
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_MPC"
-   if test "$MPCLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPCLIB -L -Wl,-rpath,$MPCLIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpc"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpc.o \$(LOCALBIN)/mp_poly.o"
-fi
-
-# check fplll presence
-if test "$FPLLLDIR" != no; then
-   if test "$FPLLLINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$FPLLLINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$FPLLLINCLUDE"
-   fi
-   if test "$FPLLLDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET fpllllib"
-   else
-      ac_fn_c_check_header_compile "$LINENO" "fplll.h" "ac_cv_header_fplll_h" "#include <mpfr.h>
-"
-if test "x$ac_cv_header_fplll_h" = x""yes; then :
-
-else
-  as_fn_error $? "library fplll not found. Specify its location, or disable it using --without-fplll" "$LINENO" 5
-fi
-
-
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_FPLLL"
-   if test "$FPLLLLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$FPLLLLIB -L -Wl,-rpath,$FPLLLLIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lfplll"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/fplll.o"
-fi
-
-fi
-
-################################################################
-# make target cxsc
-
-if test "$CXSCDIR" != no; then
-   CXSC_FLOAT_LIB=""
-   CXSC_FLOAT_O=""
-
-   if test "CXSCINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$CXSCINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$CXSCINCLUDE"
-   fi
-   if test "$CXSCDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET cxsclib"
-   else
-      ac_ext=cpp
-ac_cpp='$CXXCPP $CPPFLAGS'
-ac_compile='$CXX -c $CXXFLAGS $CPPFLAGS conftest.$ac_ext >&5'
-ac_link='$CXX -o conftest$ac_exeext $CXXFLAGS $CPPFLAGS $LDFLAGS conftest.$ac_ext $LIBS >&5'
-ac_compiler_gnu=$ac_cv_cxx_compiler_gnu
-
-
-ac_fn_cxx_check_header_mongrel "$LINENO" "interval.hpp" "ac_cv_header_interval_hpp" "$ac_includes_default"
-if test "x$ac_cv_header_interval_hpp" = x""yes; then :
-
-else
-  as_fn_error $? "library cxsc not found. Specify its location, or disable using --without-cxsc" "$LINENO" 5
-fi
-
-
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_CXSC"
-   DLL_TARGET="$DLL_TARGET \$(LOCALBIN)/cxsc_float.so"
-   CXSC_FLOAT_O="\$(LOCALBIN)/cxsc_float.o \$(LOCALBIN)/cxsc_poly.o"
-   if test "$CXSCLIB" != ""; then CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L -L$CXSCLIB -L -Wl,-rpath,$CXSCLIB"; fi
-   if echo "$TARGET" | grep -qi darwin; then # buggy darwin, can't include dll
-      CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L $CXSCLIB/libcxsc.a"
-   else
-      CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L -lcxsc"
-   fi
-fi
-
-################################################################
-# generate files
-
-WITHGMP=""
-INCLGMP=""
-LINKGMP=""
-if test "$GMPINCLUDE" != ""; then
-   WITHGMP="$WITHGMP --with-gmp-include=$GMPINCLUDE"
-   INCLGMP="-I$GMPINCLUDE"
-fi
-if test "$GMPLIB" != ""; then
-   WITHGMP="$WITHGMP --with-gmp-lib=$GMPLIB"
-   LINKGMP="-L$GMPLIB"
-fi
-WITHMPFR=""
-INCLMPFR=""
-LINKMPFR=""
-if test "$MPFRINCLUDE" != ""; then
-   WITHMPFR="$WITHMPFR --with-mpfr-include=$MPFRINCLUDE"
-   INCLMPFR="-I$MPFRINCLUDE"
-fi
-if test "$MPFRLIB" != ""; then
-   WITHMPFR="$WITHMPFR --with-mpfr-lib=$MPFRLIB"
-   LINKMPFR="-L$MPFRLIB"
-fi
-
-# prevent parallel make on mpfr, mpc, mpfi before mpfr is compiled
-if test "$MPFRDIR" == "$EXTERN"; then MPFRDEPEND=mpfrlib; fi
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-
-mkdir -p bin/$TARGET
-CONFIG_STATUS=config.status
-
-
-for ac_func in gethostbyname gettimeofday gmtime localtime getpid getppid kill gethostname
-do :
-  as_ac_var=`$as_echo "ac_cv_func_$ac_func" | $as_tr_sh`
-ac_fn_cxx_check_func "$LINENO" "$ac_func" "$as_ac_var"
-if eval test \"x\$"$as_ac_var"\" = x"yes"; then :
-  cat >>confdefs.h <<_ACEOF
-#define `$as_echo "HAVE_$ac_func" | $as_tr_cpp` 1
-_ACEOF
-
-fi
-done
-
-
-
-
-case $host_os in
-  *cygwin* ) CYGWIN=yes;;
-	 * ) CYGWIN=no;;
-esac
-
- if test "$CYGWIN" = "yes"; then
-  SYS_IS_CYGWIN_TRUE=
-  SYS_IS_CYGWIN_FALSE='#'
-else
-  SYS_IS_CYGWIN_TRUE='#'
-  SYS_IS_CYGWIN_FALSE=
-fi
-
-if test "$CYGWIN" = "yes"; then
-
-$as_echo "#define SYS_IS_CYGWIN32 1" >>confdefs.h
-
-else
-
-$as_echo "#define SYS_IS_CYGWIN32 0" >>confdefs.h
-
-fi
-
-
-
-case "$host" in
-        *-darwin* )
-
-$as_echo "#define SYS_IS_DARWIN 1" >>confdefs.h
-
-        ;;
-        * )
-
-$as_echo "#define SYS_IS_DARWIN 0" >>confdefs.h
-
-        ;;
-esac
-
-ac_config_files="$ac_config_files Makefile"
-
-
-
-#AC_CONFIG_FILES([$MAKEFILE:cnf/Makefile.am])
-
-#if test "$MAKEFILE" != Makefile; then
-#   ln -sf "$MAKEFILE" Makefile
-#fi
-
-cat >confcache <<\_ACEOF
-# This file is a shell script that caches the results of configure
-# tests run on this system so they can be shared between configure
-# scripts and configure runs, see configure's option --config-cache.
-# It is not useful on other systems.  If it contains results you don't
-# want to keep, you may remove or edit it.
-#
-# config.status only pays attention to the cache file if you give it
-# the --recheck option to rerun configure.
-#
-# `ac_cv_env_foo' variables (set or unset) will be overridden when
-# loading this file, other *unset* `ac_cv_foo' will be assigned the
-# following values.
-
-_ACEOF
-
-# The following way of writing the cache mishandles newlines in values,
-# but we know of no workaround that is simple, portable, and efficient.
-# So, we kill variables containing newlines.
-# Ultrix sh set writes to stderr and can't be redirected directly,
-# and sets the high bit in the cache file unless we assign to the vars.
-(
-  for ac_var in `(set) 2>&1 | sed -n 's/^\([a-zA-Z_][a-zA-Z0-9_]*\)=.*/\1/p'`; do
-    eval ac_val=\$$ac_var
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-    ac_option=`expr "X$1" : 'X\([^=]*\)='`
-    ac_optarg=`expr "X$1" : 'X[^=]*=\(.*\)'`
-    ac_shift=:
-    ;;
-  --*=)
-    ac_option=`expr "X$1" : 'X\([^=]*\)='`
-    ac_optarg=
-    ac_shift=:
-    ;;
-  *)
-    ac_option=$1
-    ac_optarg=$2
-    ac_shift=shift
-    ;;
-  esac
-
-  case $ac_option in
-  # Handling of the options.
-  -recheck | --recheck | --rechec | --reche | --rech | --rec | --re | --r)
-    ac_cs_recheck=: ;;
-  --version | --versio | --versi | --vers | --ver | --ve | --v | -V )
-    $as_echo "$ac_cs_version"; exit ;;
-  --config | --confi | --conf | --con | --co | --c )
-    $as_echo "$ac_cs_config"; exit ;;
-  --debug | --debu | --deb | --de | --d | -d )
-    debug=: ;;
-  --file | --fil | --fi | --f )
-    $ac_shift
-    case $ac_optarg in
-    *\'*) ac_optarg=`$as_echo "$ac_optarg" | sed "s/'/'\\\\\\\\''/g"` ;;
-    '') as_fn_error $? "missing file argument" ;;
-    esac
-    as_fn_append CONFIG_FILES " '$ac_optarg'"
-    ac_need_defaults=false;;
-  --he | --h |  --help | --hel | -h )
-    $as_echo "$ac_cs_usage"; exit ;;
-  -q | -quiet | --quiet | --quie | --qui | --qu | --q \
-  | -silent | --silent | --silen | --sile | --sil | --si | --s)
-    ac_cs_silent=: ;;
-
-  # This is an error.
-  -*) as_fn_error $? "unrecognized option: \`$1'
-Try \`$0 --help' for more information." ;;
-
-  *) as_fn_append ac_config_targets " $1"
-     ac_need_defaults=false ;;
-
-  esac
-  shift
-done
-
-ac_configure_extra_args=
-
-if $ac_cs_silent; then
-  exec 6>/dev/null
-  ac_configure_extra_args="$ac_configure_extra_args --silent"
-fi
-
-_ACEOF
-cat >>$CONFIG_STATUS <<_ACEOF || ac_write_fail=1
-if \$ac_cs_recheck; then
-  set X '$SHELL' '$0' $ac_configure_args \$ac_configure_extra_args --no-create --no-recursion
-  shift
-  \$as_echo "running CONFIG_SHELL=$SHELL \$*" >&6
-  CONFIG_SHELL='$SHELL'
-  export CONFIG_SHELL
-  exec "\$@"
-fi
-
-_ACEOF
-cat >>$CONFIG_STATUS <<\_ACEOF || ac_write_fail=1
-exec 5>>config.log
-{
-  echo
-  sed 'h;s/./-/g;s/^.../## /;s/...$/ ##/;p;x;p;x' <<_ASBOX
-## Running $as_me. ##
-_ASBOX
-  $as_echo "$ac_log"
-} >&5
-
-_ACEOF
-cat >>$CONFIG_STATUS <<_ACEOF || ac_write_fail=1
-#
-# INIT-COMMANDS
-#
-AMDEP_TRUE="$AMDEP_TRUE" ac_aux_dir="$ac_aux_dir"
-
-
-# The HP-UX ksh and POSIX shell print the target directory to stdout
-# if CDPATH is set.
-(unset CDPATH) >/dev/null 2>&1 && unset CDPATH
-
-sed_quote_subst='$sed_quote_subst'
-double_quote_subst='$double_quote_subst'
-delay_variable_subst='$delay_variable_subst'
-macro_version='`$ECHO "$macro_version" | $SED "$delay_single_quote_subst"`'
-macro_revision='`$ECHO "$macro_revision" | $SED "$delay_single_quote_subst"`'
-enable_static='`$ECHO "$enable_static" | $SED "$delay_single_quote_subst"`'
-AS='`$ECHO "$AS" | $SED "$delay_single_quote_subst"`'
-DLLTOOL='`$ECHO "$DLLTOOL" | $SED "$delay_single_quote_subst"`'
-OBJDUMP='`$ECHO "$OBJDUMP" | $SED "$delay_single_quote_subst"`'
-enable_shared='`$ECHO "$enable_shared" | $SED "$delay_single_quote_subst"`'
-pic_mode='`$ECHO "$pic_mode" | $SED "$delay_single_quote_subst"`'
-enable_fast_install='`$ECHO "$enable_fast_install" | $SED "$delay_single_quote_subst"`'
-SHELL='`$ECHO "$SHELL" | $SED "$delay_single_quote_subst"`'
-ECHO='`$ECHO "$ECHO" | $SED "$delay_single_quote_subst"`'
-PATH_SEPARATOR='`$ECHO "$PATH_SEPARATOR" | $SED "$delay_single_quote_subst"`'
-host_alias='`$ECHO "$host_alias" | $SED "$delay_single_quote_subst"`'
-host='`$ECHO "$host" | $SED "$delay_single_quote_subst"`'
-host_os='`$ECHO "$host_os" | $SED "$delay_single_quote_subst"`'
-build_alias='`$ECHO "$build_alias" | $SED "$delay_single_quote_subst"`'
-build='`$ECHO "$build" | $SED "$delay_single_quote_subst"`'
-build_os='`$ECHO "$build_os" | $SED "$delay_single_quote_subst"`'
-SED='`$ECHO "$SED" | $SED "$delay_single_quote_subst"`'
-Xsed='`$ECHO "$Xsed" | $SED "$delay_single_quote_subst"`'
-GREP='`$ECHO "$GREP" | $SED "$delay_single_quote_subst"`'
-EGREP='`$ECHO "$EGREP" | $SED "$delay_single_quote_subst"`'
-FGREP='`$ECHO "$FGREP" | $SED "$delay_single_quote_subst"`'
-LD='`$ECHO "$LD" | $SED "$delay_single_quote_subst"`'
-NM='`$ECHO "$NM" | $SED "$delay_single_quote_subst"`'
-LN_S='`$ECHO "$LN_S" | $SED "$delay_single_quote_subst"`'
-max_cmd_len='`$ECHO "$max_cmd_len" | $SED "$delay_single_quote_subst"`'
-ac_objext='`$ECHO "$ac_objext" | $SED "$delay_single_quote_subst"`'
-exeext='`$ECHO "$exeext" | $SED "$delay_single_quote_subst"`'
-lt_unset='`$ECHO "$lt_unset" | $SED "$delay_single_quote_subst"`'
-lt_SP2NL='`$ECHO "$lt_SP2NL" | $SED "$delay_single_quote_subst"`'
-lt_NL2SP='`$ECHO "$lt_NL2SP" | $SED "$delay_single_quote_subst"`'
-lt_cv_to_host_file_cmd='`$ECHO "$lt_cv_to_host_file_cmd" | $SED "$delay_single_quote_subst"`'
-lt_cv_to_tool_file_cmd='`$ECHO "$lt_cv_to_tool_file_cmd" | $SED "$delay_single_quote_subst"`'
-reload_flag='`$ECHO "$reload_flag" | $SED "$delay_single_quote_subst"`'
-reload_cmds='`$ECHO "$reload_cmds" | $SED "$delay_single_quote_subst"`'
-deplibs_check_method='`$ECHO "$deplibs_check_method" | $SED "$delay_single_quote_subst"`'
-file_magic_cmd='`$ECHO "$file_magic_cmd" | $SED "$delay_single_quote_subst"`'
-file_magic_glob='`$ECHO "$file_magic_glob" | $SED "$delay_single_quote_subst"`'
-want_nocaseglob='`$ECHO "$want_nocaseglob" | $SED "$delay_single_quote_subst"`'
-sharedlib_from_linklib_cmd='`$ECHO "$sharedlib_from_linklib_cmd" | $SED "$delay_single_quote_subst"`'
-AR='`$ECHO "$AR" | $SED "$delay_single_quote_subst"`'
-AR_FLAGS='`$ECHO "$AR_FLAGS" | $SED "$delay_single_quote_subst"`'
-archiver_list_spec='`$ECHO "$archiver_list_spec" | $SED "$delay_single_quote_subst"`'
-STRIP='`$ECHO "$STRIP" | $SED "$delay_single_quote_subst"`'
-RANLIB='`$ECHO "$RANLIB" | $SED "$delay_single_quote_subst"`'
-old_postinstall_cmds='`$ECHO "$old_postinstall_cmds" | $SED "$delay_single_quote_subst"`'
-old_postuninstall_cmds='`$ECHO "$old_postuninstall_cmds" | $SED "$delay_single_quote_subst"`'
-old_archive_cmds='`$ECHO "$old_archive_cmds" | $SED "$delay_single_quote_subst"`'
-lock_old_archive_extraction='`$ECHO "$lock_old_archive_extraction" | $SED "$delay_single_quote_subst"`'
-CC='`$ECHO "$CC" | $SED "$delay_single_quote_subst"`'
-CFLAGS='`$ECHO "$CFLAGS" | $SED "$delay_single_quote_subst"`'
-compiler='`$ECHO "$compiler" | $SED "$delay_single_quote_subst"`'
-GCC='`$ECHO "$GCC" | $SED "$delay_single_quote_subst"`'
-lt_cv_sys_global_symbol_pipe='`$ECHO "$lt_cv_sys_global_symbol_pipe" | $SED "$delay_single_quote_subst"`'
-lt_cv_sys_global_symbol_to_cdecl='`$ECHO "$lt_cv_sys_global_symbol_to_cdecl" | $SED "$delay_single_quote_subst"`'
-lt_cv_sys_global_symbol_to_c_name_address='`$ECHO "$lt_cv_sys_global_symbol_to_c_name_address" | $SED "$delay_single_quote_subst"`'
-lt_cv_sys_global_symbol_to_c_name_address_lib_prefix='`$ECHO "$lt_cv_sys_global_symbol_to_c_name_address_lib_prefix" | $SED "$delay_single_quote_subst"`'
-nm_file_list_spec='`$ECHO "$nm_file_list_spec" | $SED "$delay_single_quote_subst"`'
-lt_sysroot='`$ECHO "$lt_sysroot" | $SED "$delay_single_quote_subst"`'
-objdir='`$ECHO "$objdir" | $SED "$delay_single_quote_subst"`'
-MAGIC_CMD='`$ECHO "$MAGIC_CMD" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_no_builtin_flag='`$ECHO "$lt_prog_compiler_no_builtin_flag" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_pic='`$ECHO "$lt_prog_compiler_pic" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_wl='`$ECHO "$lt_prog_compiler_wl" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_static='`$ECHO "$lt_prog_compiler_static" | $SED "$delay_single_quote_subst"`'
-lt_cv_prog_compiler_c_o='`$ECHO "$lt_cv_prog_compiler_c_o" | $SED "$delay_single_quote_subst"`'
-need_locks='`$ECHO "$need_locks" | $SED "$delay_single_quote_subst"`'
-MANIFEST_TOOL='`$ECHO "$MANIFEST_TOOL" | $SED "$delay_single_quote_subst"`'
-DSYMUTIL='`$ECHO "$DSYMUTIL" | $SED "$delay_single_quote_subst"`'
-NMEDIT='`$ECHO "$NMEDIT" | $SED "$delay_single_quote_subst"`'
-LIPO='`$ECHO "$LIPO" | $SED "$delay_single_quote_subst"`'
-OTOOL='`$ECHO "$OTOOL" | $SED "$delay_single_quote_subst"`'
-OTOOL64='`$ECHO "$OTOOL64" | $SED "$delay_single_quote_subst"`'
-libext='`$ECHO "$libext" | $SED "$delay_single_quote_subst"`'
-shrext_cmds='`$ECHO "$shrext_cmds" | $SED "$delay_single_quote_subst"`'
-extract_expsyms_cmds='`$ECHO "$extract_expsyms_cmds" | $SED "$delay_single_quote_subst"`'
-archive_cmds_need_lc='`$ECHO "$archive_cmds_need_lc" | $SED "$delay_single_quote_subst"`'
-enable_shared_with_static_runtimes='`$ECHO "$enable_shared_with_static_runtimes" | $SED "$delay_single_quote_subst"`'
-export_dynamic_flag_spec='`$ECHO "$export_dynamic_flag_spec" | $SED "$delay_single_quote_subst"`'
-whole_archive_flag_spec='`$ECHO "$whole_archive_flag_spec" | $SED "$delay_single_quote_subst"`'
-compiler_needs_object='`$ECHO "$compiler_needs_object" | $SED "$delay_single_quote_subst"`'
-old_archive_from_new_cmds='`$ECHO "$old_archive_from_new_cmds" | $SED "$delay_single_quote_subst"`'
-old_archive_from_expsyms_cmds='`$ECHO "$old_archive_from_expsyms_cmds" | $SED "$delay_single_quote_subst"`'
-archive_cmds='`$ECHO "$archive_cmds" | $SED "$delay_single_quote_subst"`'
-archive_expsym_cmds='`$ECHO "$archive_expsym_cmds" | $SED "$delay_single_quote_subst"`'
-module_cmds='`$ECHO "$module_cmds" | $SED "$delay_single_quote_subst"`'
-module_expsym_cmds='`$ECHO "$module_expsym_cmds" | $SED "$delay_single_quote_subst"`'
-with_gnu_ld='`$ECHO "$with_gnu_ld" | $SED "$delay_single_quote_subst"`'
-allow_undefined_flag='`$ECHO "$allow_undefined_flag" | $SED "$delay_single_quote_subst"`'
-no_undefined_flag='`$ECHO "$no_undefined_flag" | $SED "$delay_single_quote_subst"`'
-hardcode_libdir_flag_spec='`$ECHO "$hardcode_libdir_flag_spec" | $SED "$delay_single_quote_subst"`'
-hardcode_libdir_separator='`$ECHO "$hardcode_libdir_separator" | $SED "$delay_single_quote_subst"`'
-hardcode_direct='`$ECHO "$hardcode_direct" | $SED "$delay_single_quote_subst"`'
-hardcode_direct_absolute='`$ECHO "$hardcode_direct_absolute" | $SED "$delay_single_quote_subst"`'
-hardcode_minus_L='`$ECHO "$hardcode_minus_L" | $SED "$delay_single_quote_subst"`'
-hardcode_shlibpath_var='`$ECHO "$hardcode_shlibpath_var" | $SED "$delay_single_quote_subst"`'
-hardcode_automatic='`$ECHO "$hardcode_automatic" | $SED "$delay_single_quote_subst"`'
-inherit_rpath='`$ECHO "$inherit_rpath" | $SED "$delay_single_quote_subst"`'
-link_all_deplibs='`$ECHO "$link_all_deplibs" | $SED "$delay_single_quote_subst"`'
-always_export_symbols='`$ECHO "$always_export_symbols" | $SED "$delay_single_quote_subst"`'
-export_symbols_cmds='`$ECHO "$export_symbols_cmds" | $SED "$delay_single_quote_subst"`'
-exclude_expsyms='`$ECHO "$exclude_expsyms" | $SED "$delay_single_quote_subst"`'
-include_expsyms='`$ECHO "$include_expsyms" | $SED "$delay_single_quote_subst"`'
-prelink_cmds='`$ECHO "$prelink_cmds" | $SED "$delay_single_quote_subst"`'
-postlink_cmds='`$ECHO "$postlink_cmds" | $SED "$delay_single_quote_subst"`'
-file_list_spec='`$ECHO "$file_list_spec" | $SED "$delay_single_quote_subst"`'
-variables_saved_for_relink='`$ECHO "$variables_saved_for_relink" | $SED "$delay_single_quote_subst"`'
-need_lib_prefix='`$ECHO "$need_lib_prefix" | $SED "$delay_single_quote_subst"`'
-need_version='`$ECHO "$need_version" | $SED "$delay_single_quote_subst"`'
-version_type='`$ECHO "$version_type" | $SED "$delay_single_quote_subst"`'
-runpath_var='`$ECHO "$runpath_var" | $SED "$delay_single_quote_subst"`'
-shlibpath_var='`$ECHO "$shlibpath_var" | $SED "$delay_single_quote_subst"`'
-shlibpath_overrides_runpath='`$ECHO "$shlibpath_overrides_runpath" | $SED "$delay_single_quote_subst"`'
-libname_spec='`$ECHO "$libname_spec" | $SED "$delay_single_quote_subst"`'
-library_names_spec='`$ECHO "$library_names_spec" | $SED "$delay_single_quote_subst"`'
-soname_spec='`$ECHO "$soname_spec" | $SED "$delay_single_quote_subst"`'
-install_override_mode='`$ECHO "$install_override_mode" | $SED "$delay_single_quote_subst"`'
-postinstall_cmds='`$ECHO "$postinstall_cmds" | $SED "$delay_single_quote_subst"`'
-postuninstall_cmds='`$ECHO "$postuninstall_cmds" | $SED "$delay_single_quote_subst"`'
-finish_cmds='`$ECHO "$finish_cmds" | $SED "$delay_single_quote_subst"`'
-finish_eval='`$ECHO "$finish_eval" | $SED "$delay_single_quote_subst"`'
-hardcode_into_libs='`$ECHO "$hardcode_into_libs" | $SED "$delay_single_quote_subst"`'
-sys_lib_search_path_spec='`$ECHO "$sys_lib_search_path_spec" | $SED "$delay_single_quote_subst"`'
-sys_lib_dlsearch_path_spec='`$ECHO "$sys_lib_dlsearch_path_spec" | $SED "$delay_single_quote_subst"`'
-hardcode_action='`$ECHO "$hardcode_action" | $SED "$delay_single_quote_subst"`'
-enable_dlopen='`$ECHO "$enable_dlopen" | $SED "$delay_single_quote_subst"`'
-enable_dlopen_self='`$ECHO "$enable_dlopen_self" | $SED "$delay_single_quote_subst"`'
-enable_dlopen_self_static='`$ECHO "$enable_dlopen_self_static" | $SED "$delay_single_quote_subst"`'
-old_striplib='`$ECHO "$old_striplib" | $SED "$delay_single_quote_subst"`'
-striplib='`$ECHO "$striplib" | $SED "$delay_single_quote_subst"`'
-compiler_lib_search_dirs='`$ECHO "$compiler_lib_search_dirs" | $SED "$delay_single_quote_subst"`'
-predep_objects='`$ECHO "$predep_objects" | $SED "$delay_single_quote_subst"`'
-postdep_objects='`$ECHO "$postdep_objects" | $SED "$delay_single_quote_subst"`'
-predeps='`$ECHO "$predeps" | $SED "$delay_single_quote_subst"`'
-postdeps='`$ECHO "$postdeps" | $SED "$delay_single_quote_subst"`'
-compiler_lib_search_path='`$ECHO "$compiler_lib_search_path" | $SED "$delay_single_quote_subst"`'
-LD_CXX='`$ECHO "$LD_CXX" | $SED "$delay_single_quote_subst"`'
-reload_flag_CXX='`$ECHO "$reload_flag_CXX" | $SED "$delay_single_quote_subst"`'
-reload_cmds_CXX='`$ECHO "$reload_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-old_archive_cmds_CXX='`$ECHO "$old_archive_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-compiler_CXX='`$ECHO "$compiler_CXX" | $SED "$delay_single_quote_subst"`'
-GCC_CXX='`$ECHO "$GCC_CXX" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_no_builtin_flag_CXX='`$ECHO "$lt_prog_compiler_no_builtin_flag_CXX" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_pic_CXX='`$ECHO "$lt_prog_compiler_pic_CXX" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_wl_CXX='`$ECHO "$lt_prog_compiler_wl_CXX" | $SED "$delay_single_quote_subst"`'
-lt_prog_compiler_static_CXX='`$ECHO "$lt_prog_compiler_static_CXX" | $SED "$delay_single_quote_subst"`'
-lt_cv_prog_compiler_c_o_CXX='`$ECHO "$lt_cv_prog_compiler_c_o_CXX" | $SED "$delay_single_quote_subst"`'
-archive_cmds_need_lc_CXX='`$ECHO "$archive_cmds_need_lc_CXX" | $SED "$delay_single_quote_subst"`'
-enable_shared_with_static_runtimes_CXX='`$ECHO "$enable_shared_with_static_runtimes_CXX" | $SED "$delay_single_quote_subst"`'
-export_dynamic_flag_spec_CXX='`$ECHO "$export_dynamic_flag_spec_CXX" | $SED "$delay_single_quote_subst"`'
-whole_archive_flag_spec_CXX='`$ECHO "$whole_archive_flag_spec_CXX" | $SED "$delay_single_quote_subst"`'
-compiler_needs_object_CXX='`$ECHO "$compiler_needs_object_CXX" | $SED "$delay_single_quote_subst"`'
-old_archive_from_new_cmds_CXX='`$ECHO "$old_archive_from_new_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-old_archive_from_expsyms_cmds_CXX='`$ECHO "$old_archive_from_expsyms_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-archive_cmds_CXX='`$ECHO "$archive_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-archive_expsym_cmds_CXX='`$ECHO "$archive_expsym_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-module_cmds_CXX='`$ECHO "$module_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-module_expsym_cmds_CXX='`$ECHO "$module_expsym_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-with_gnu_ld_CXX='`$ECHO "$with_gnu_ld_CXX" | $SED "$delay_single_quote_subst"`'
-allow_undefined_flag_CXX='`$ECHO "$allow_undefined_flag_CXX" | $SED "$delay_single_quote_subst"`'
-no_undefined_flag_CXX='`$ECHO "$no_undefined_flag_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_libdir_flag_spec_CXX='`$ECHO "$hardcode_libdir_flag_spec_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_libdir_separator_CXX='`$ECHO "$hardcode_libdir_separator_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_direct_CXX='`$ECHO "$hardcode_direct_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_direct_absolute_CXX='`$ECHO "$hardcode_direct_absolute_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_minus_L_CXX='`$ECHO "$hardcode_minus_L_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_shlibpath_var_CXX='`$ECHO "$hardcode_shlibpath_var_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_automatic_CXX='`$ECHO "$hardcode_automatic_CXX" | $SED "$delay_single_quote_subst"`'
-inherit_rpath_CXX='`$ECHO "$inherit_rpath_CXX" | $SED "$delay_single_quote_subst"`'
-link_all_deplibs_CXX='`$ECHO "$link_all_deplibs_CXX" | $SED "$delay_single_quote_subst"`'
-always_export_symbols_CXX='`$ECHO "$always_export_symbols_CXX" | $SED "$delay_single_quote_subst"`'
-export_symbols_cmds_CXX='`$ECHO "$export_symbols_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-exclude_expsyms_CXX='`$ECHO "$exclude_expsyms_CXX" | $SED "$delay_single_quote_subst"`'
-include_expsyms_CXX='`$ECHO "$include_expsyms_CXX" | $SED "$delay_single_quote_subst"`'
-prelink_cmds_CXX='`$ECHO "$prelink_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-postlink_cmds_CXX='`$ECHO "$postlink_cmds_CXX" | $SED "$delay_single_quote_subst"`'
-file_list_spec_CXX='`$ECHO "$file_list_spec_CXX" | $SED "$delay_single_quote_subst"`'
-hardcode_action_CXX='`$ECHO "$hardcode_action_CXX" | $SED "$delay_single_quote_subst"`'
-compiler_lib_search_dirs_CXX='`$ECHO "$compiler_lib_search_dirs_CXX" | $SED "$delay_single_quote_subst"`'
-predep_objects_CXX='`$ECHO "$predep_objects_CXX" | $SED "$delay_single_quote_subst"`'
-postdep_objects_CXX='`$ECHO "$postdep_objects_CXX" | $SED "$delay_single_quote_subst"`'
-predeps_CXX='`$ECHO "$predeps_CXX" | $SED "$delay_single_quote_subst"`'
-postdeps_CXX='`$ECHO "$postdeps_CXX" | $SED "$delay_single_quote_subst"`'
-compiler_lib_search_path_CXX='`$ECHO "$compiler_lib_search_path_CXX" | $SED "$delay_single_quote_subst"`'
-
-LTCC='$LTCC'
-LTCFLAGS='$LTCFLAGS'
-compiler='$compiler_DEFAULT'
-
-# A function that is used when there is no print builtin or printf.
-func_fallback_echo ()
-{
-  eval 'cat <<_LTECHO_EOF
-\$1
-_LTECHO_EOF'
-}
-
-# Quote evaled strings.
-for var in AS \
-DLLTOOL \
-OBJDUMP \
-SHELL \
-ECHO \
-PATH_SEPARATOR \
-SED \
-GREP \
-EGREP \
-FGREP \
-LD \
-NM \
-LN_S \
-lt_SP2NL \
-lt_NL2SP \
-reload_flag \
-deplibs_check_method \
-file_magic_cmd \
-file_magic_glob \
-want_nocaseglob \
-sharedlib_from_linklib_cmd \
-AR \
-AR_FLAGS \
-archiver_list_spec \
-STRIP \
-RANLIB \
-CC \
-CFLAGS \
-compiler \
-lt_cv_sys_global_symbol_pipe \
-lt_cv_sys_global_symbol_to_cdecl \
-lt_cv_sys_global_symbol_to_c_name_address \
-lt_cv_sys_global_symbol_to_c_name_address_lib_prefix \
-nm_file_list_spec \
-lt_prog_compiler_no_builtin_flag \
-lt_prog_compiler_pic \
-lt_prog_compiler_wl \
-lt_prog_compiler_static \
-lt_cv_prog_compiler_c_o \
-need_locks \
-MANIFEST_TOOL \
-DSYMUTIL \
-NMEDIT \
-LIPO \
-OTOOL \
-OTOOL64 \
-shrext_cmds \
-export_dynamic_flag_spec \
-whole_archive_flag_spec \
-compiler_needs_object \
-with_gnu_ld \
-allow_undefined_flag \
-no_undefined_flag \
-hardcode_libdir_flag_spec \
-hardcode_libdir_separator \
-exclude_expsyms \
-include_expsyms \
-file_list_spec \
-variables_saved_for_relink \
-libname_spec \
-library_names_spec \
-soname_spec \
-install_override_mode \
-finish_eval \
-old_striplib \
-striplib \
-compiler_lib_search_dirs \
-predep_objects \
-postdep_objects \
-predeps \
-postdeps \
-compiler_lib_search_path \
-LD_CXX \
-reload_flag_CXX \
-compiler_CXX \
-lt_prog_compiler_no_builtin_flag_CXX \
-lt_prog_compiler_pic_CXX \
-lt_prog_compiler_wl_CXX \
-lt_prog_compiler_static_CXX \
-lt_cv_prog_compiler_c_o_CXX \
-export_dynamic_flag_spec_CXX \
-whole_archive_flag_spec_CXX \
-compiler_needs_object_CXX \
-with_gnu_ld_CXX \
-allow_undefined_flag_CXX \
-no_undefined_flag_CXX \
-hardcode_libdir_flag_spec_CXX \
-hardcode_libdir_separator_CXX \
-exclude_expsyms_CXX \
-include_expsyms_CXX \
-file_list_spec_CXX \
-compiler_lib_search_dirs_CXX \
-predep_objects_CXX \
-postdep_objects_CXX \
-predeps_CXX \
-postdeps_CXX \
-compiler_lib_search_path_CXX; do
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-      eval "lt_\$var=\\\\\\"\\\`\\\$ECHO \\"\\\$\$var\\" | \\\$SED \\"\\\$sed_quote_subst\\"\\\`\\\\\\""
-      ;;
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-      eval "lt_\$var=\\\\\\"\\\$\$var\\\\\\""
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-done
-
-# Double-quote double-evaled strings.
-for var in reload_cmds \
-old_postinstall_cmds \
-old_postuninstall_cmds \
-old_archive_cmds \
-extract_expsyms_cmds \
-old_archive_from_new_cmds \
-old_archive_from_expsyms_cmds \
-archive_cmds \
-archive_expsym_cmds \
-module_cmds \
-module_expsym_cmds \
-export_symbols_cmds \
-prelink_cmds \
-postlink_cmds \
-postinstall_cmds \
-postuninstall_cmds \
-finish_cmds \
-sys_lib_search_path_spec \
-sys_lib_dlsearch_path_spec \
-reload_cmds_CXX \
-old_archive_cmds_CXX \
-old_archive_from_new_cmds_CXX \
-old_archive_from_expsyms_cmds_CXX \
-archive_cmds_CXX \
-archive_expsym_cmds_CXX \
-module_cmds_CXX \
-module_expsym_cmds_CXX \
-export_symbols_cmds_CXX \
-prelink_cmds_CXX \
-postlink_cmds_CXX; do
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-      ;;
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-
-# See if we are running on zsh, and set the options which allow our
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-
-
-    PACKAGE='$PACKAGE'
-    VERSION='$VERSION'
-    TIMESTAMP='$TIMESTAMP'
-    RM='$RM'
-    ofile='$ofile'
-
-
-
-
-
-
-_ACEOF
-
-cat >>$CONFIG_STATUS <<\_ACEOF || ac_write_fail=1
-
-# Handling of arguments.
-for ac_config_target in $ac_config_targets
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-
-  *) as_fn_error $? "invalid argument: \`$ac_config_target'" "$LINENO" 5 ;;
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-
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-# Set up the scripts for CONFIG_FILES section.
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-
-ac_cr=`echo X | tr X '\015'`
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-_ACAWK
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-cat >>$CONFIG_STATUS <<\_ACEOF || ac_write_fail=1
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-      dirpart=`$as_dirname -- "$mf" ||
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-	 X"$mf" : 'X\(//\)[^/]' \| \
-	 X"$mf" : 'X\(//\)$' \| \
-	 X"$mf" : 'X\(/\)' \| . 2>/dev/null ||
-$as_echo X"$mf" |
-    sed '/^X\(.*[^/]\)\/\/*[^/][^/]*\/*$/{
-	    s//\1/
-	    q
-	  }
-	  /^X\(\/\/\)[^/].*/{
-	    s//\1/
-	    q
-	  }
-	  /^X\(\/\/\)$/{
-	    s//\1/
-	    q
-	  }
-	  /^X\(\/\).*/{
-	    s//\1/
-	    q
-	  }
-	  s/.*/./; q'`
-    else
-      continue
-    fi
-    # Extract the definition of DEPDIR, am__include, and am__quote
-    # from the Makefile without running `make'.
-    DEPDIR=`sed -n 's/^DEPDIR = //p' < "$mf"`
-    test -z "$DEPDIR" && continue
-    am__include=`sed -n 's/^am__include = //p' < "$mf"`
-    test -z "am__include" && continue
-    am__quote=`sed -n 's/^am__quote = //p' < "$mf"`
-    # When using ansi2knr, U may be empty or an underscore; expand it
-    U=`sed -n 's/^U = //p' < "$mf"`
-    # Find all dependency output files, they are included files with
-    # $(DEPDIR) in their names.  We invoke sed twice because it is the
-    # simplest approach to changing $(DEPDIR) to its actual value in the
-    # expansion.
-    for file in `sed -n "
-      s/^$am__include $am__quote\(.*(DEPDIR).*\)$am__quote"'$/\1/p' <"$mf" | \
-	 sed -e 's/\$(DEPDIR)/'"$DEPDIR"'/g' -e 's/\$U/'"$U"'/g'`; do
-      # Make sure the directory exists.
-      test -f "$dirpart/$file" && continue
-      fdir=`$as_dirname -- "$file" ||
-$as_expr X"$file" : 'X\(.*[^/]\)//*[^/][^/]*/*$' \| \
-	 X"$file" : 'X\(//\)[^/]' \| \
-	 X"$file" : 'X\(//\)$' \| \
-	 X"$file" : 'X\(/\)' \| . 2>/dev/null ||
-$as_echo X"$file" |
-    sed '/^X\(.*[^/]\)\/\/*[^/][^/]*\/*$/{
-	    s//\1/
-	    q
-	  }
-	  /^X\(\/\/\)[^/].*/{
-	    s//\1/
-	    q
-	  }
-	  /^X\(\/\/\)$/{
-	    s//\1/
-	    q
-	  }
-	  /^X\(\/\).*/{
-	    s//\1/
-	    q
-	  }
-	  s/.*/./; q'`
-      as_dir=$dirpart/$fdir; as_fn_mkdir_p
-      # echo "creating $dirpart/$file"
-      echo '# dummy' > "$dirpart/$file"
-    done
-  done
-}
- ;;
-    "libtool":C)
-
-    # See if we are running on zsh, and set the options which allow our
-    # commands through without removal of \ escapes.
-    if test -n "${ZSH_VERSION+set}" ; then
-      setopt NO_GLOB_SUBST
-    fi
-
-    cfgfile="${ofile}T"
-    trap "$RM \"$cfgfile\"; exit 1" 1 2 15
-    $RM "$cfgfile"
-
-    cat <<_LT_EOF >> "$cfgfile"
-#! $SHELL
-
-# `$ECHO "$ofile" | sed 's%^.*/%%'` - Provide generalized library-building support services.
-# Generated automatically by $as_me ($PACKAGE$TIMESTAMP) $VERSION
-# Libtool was configured on host `(hostname || uname -n) 2>/dev/null | sed 1q`:
-# NOTE: Changes made to this file will be lost: look at ltmain.sh.
-#
-#   Copyright (C) 1996, 1997, 1998, 1999, 2000, 2001, 2003, 2004, 2005,
-#                 2006, 2007, 2008, 2009, 2010, 2011 Free Software
-#                 Foundation, Inc.
-#   Written by Gordon Matzigkeit, 1996
-#
-#   This file is part of GNU Libtool.
-#
-# GNU Libtool is free software; you can redistribute it and/or
-# modify it under the terms of the GNU General Public License as
-# published by the Free Software Foundation; either version 2 of
-# the License, or (at your option) any later version.
-#
-# As a special exception to the GNU General Public License,
-# if you distribute this file as part of a program or library that
-# is built using GNU Libtool, you may include this file under the
-# same distribution terms that you use for the rest of that program.
-#
-# GNU Libtool is distributed in the hope that it will be useful,
-# but WITHOUT ANY WARRANTY; without even the implied warranty of
-# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
-# GNU General Public License for more details.
-#
-# You should have received a copy of the GNU General Public License
-# along with GNU Libtool; see the file COPYING.  If not, a copy
-# can be downloaded from http://www.gnu.org/licenses/gpl.html, or
-# obtained by writing to the Free Software Foundation, Inc.,
-# 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301, USA.
-
-
-# The names of the tagged configurations supported by this script.
-available_tags="CXX "
-
-# ### BEGIN LIBTOOL CONFIG
-
-# Which release of libtool.m4 was used?
-macro_version=$macro_version
-macro_revision=$macro_revision
-
-# Whether or not to build static libraries.
-build_old_libs=$enable_static
-
-# Assembler program.
-AS=$lt_AS
-
-# DLL creation program.
-DLLTOOL=$lt_DLLTOOL
-
-# Object dumper program.
-OBJDUMP=$lt_OBJDUMP
-
-# Whether or not to build shared libraries.
-build_libtool_libs=$enable_shared
-
-# What type of objects to build.
-pic_mode=$pic_mode
-
-# Whether or not to optimize for fast installation.
-fast_install=$enable_fast_install
-
-# Shell to use when invoking shell scripts.
-SHELL=$lt_SHELL
-
-# An echo program that protects backslashes.
-ECHO=$lt_ECHO
-
-# The PATH separator for the build system.
-PATH_SEPARATOR=$lt_PATH_SEPARATOR
-
-# The host system.
-host_alias=$host_alias
-host=$host
-host_os=$host_os
-
-# The build system.
-build_alias=$build_alias
-build=$build
-build_os=$build_os
-
-# A sed program that does not truncate output.
-SED=$lt_SED
-
-# Sed that helps us avoid accidentally triggering echo(1) options like -n.
-Xsed="\$SED -e 1s/^X//"
-
-# A grep program that handles long lines.
-GREP=$lt_GREP
-
-# An ERE matcher.
-EGREP=$lt_EGREP
-
-# A literal string matcher.
-FGREP=$lt_FGREP
-
-# A BSD- or MS-compatible name lister.
-NM=$lt_NM
-
-# Whether we need soft or hard links.
-LN_S=$lt_LN_S
-
-# What is the maximum length of a command?
-max_cmd_len=$max_cmd_len
-
-# Object file suffix (normally "o").
-objext=$ac_objext
-
-# Executable file suffix (normally "").
-exeext=$exeext
-
-# whether the shell understands "unset".
-lt_unset=$lt_unset
-
-# turn spaces into newlines.
-SP2NL=$lt_lt_SP2NL
-
-# turn newlines into spaces.
-NL2SP=$lt_lt_NL2SP
-
-# convert \$build file names to \$host format.
-to_host_file_cmd=$lt_cv_to_host_file_cmd
-
-# convert \$build files to toolchain format.
-to_tool_file_cmd=$lt_cv_to_tool_file_cmd
-
-# Method to check whether dependent libraries are shared objects.
-deplibs_check_method=$lt_deplibs_check_method
-
-# Command to use when deplibs_check_method = "file_magic".
-file_magic_cmd=$lt_file_magic_cmd
-
-# How to find potential files when deplibs_check_method = "file_magic".
-file_magic_glob=$lt_file_magic_glob
-
-# Find potential files using nocaseglob when deplibs_check_method = "file_magic".
-want_nocaseglob=$lt_want_nocaseglob
-
-# Command to associate shared and link libraries.
-sharedlib_from_linklib_cmd=$lt_sharedlib_from_linklib_cmd
-
-# The archiver.
-AR=$lt_AR
-
-# Flags to create an archive.
-AR_FLAGS=$lt_AR_FLAGS
-
-# How to feed a file listing to the archiver.
-archiver_list_spec=$lt_archiver_list_spec
-
-# A symbol stripping program.
-STRIP=$lt_STRIP
-
-# Commands used to install an old-style archive.
-RANLIB=$lt_RANLIB
-old_postinstall_cmds=$lt_old_postinstall_cmds
-old_postuninstall_cmds=$lt_old_postuninstall_cmds
-
-# Whether to use a lock for old archive extraction.
-lock_old_archive_extraction=$lock_old_archive_extraction
-
-# A C compiler.
-LTCC=$lt_CC
-
-# LTCC compiler flags.
-LTCFLAGS=$lt_CFLAGS
-
-# Take the output of nm and produce a listing of raw symbols and C names.
-global_symbol_pipe=$lt_lt_cv_sys_global_symbol_pipe
-
-# Transform the output of nm in a proper C declaration.
-global_symbol_to_cdecl=$lt_lt_cv_sys_global_symbol_to_cdecl
-
-# Transform the output of nm in a C name address pair.
-global_symbol_to_c_name_address=$lt_lt_cv_sys_global_symbol_to_c_name_address
-
-# Transform the output of nm in a C name address pair when lib prefix is needed.
-global_symbol_to_c_name_address_lib_prefix=$lt_lt_cv_sys_global_symbol_to_c_name_address_lib_prefix
-
-# Specify filename containing input files for \$NM.
-nm_file_list_spec=$lt_nm_file_list_spec
-
-# The root where to search for dependent libraries,and in which our libraries should be installed.
-lt_sysroot=$lt_sysroot
-
-# The name of the directory that contains temporary libtool files.
-objdir=$objdir
-
-# Used to examine libraries when file_magic_cmd begins with "file".
-MAGIC_CMD=$MAGIC_CMD
-
-# Must we lock files when doing compilation?
-need_locks=$lt_need_locks
-
-# Manifest tool.
-MANIFEST_TOOL=$lt_MANIFEST_TOOL
-
-# Tool to manipulate archived DWARF debug symbol files on Mac OS X.
-DSYMUTIL=$lt_DSYMUTIL
-
-# Tool to change global to local symbols on Mac OS X.
-NMEDIT=$lt_NMEDIT
-
-# Tool to manipulate fat objects and archives on Mac OS X.
-LIPO=$lt_LIPO
-
-# ldd/readelf like tool for Mach-O binaries on Mac OS X.
-OTOOL=$lt_OTOOL
-
-# ldd/readelf like tool for 64 bit Mach-O binaries on Mac OS X 10.4.
-OTOOL64=$lt_OTOOL64
-
-# Old archive suffix (normally "a").
-libext=$libext
-
-# Shared library suffix (normally ".so").
-shrext_cmds=$lt_shrext_cmds
-
-# The commands to extract the exported symbol list from a shared archive.
-extract_expsyms_cmds=$lt_extract_expsyms_cmds
-
-# Variables whose values should be saved in libtool wrapper scripts and
-# restored at link time.
-variables_saved_for_relink=$lt_variables_saved_for_relink
-
-# Do we need the "lib" prefix for modules?
-need_lib_prefix=$need_lib_prefix
-
-# Do we need a version for libraries?
-need_version=$need_version
-
-# Library versioning type.
-version_type=$version_type
-
-# Shared library runtime path variable.
-runpath_var=$runpath_var
-
-# Shared library path variable.
-shlibpath_var=$shlibpath_var
-
-# Is shlibpath searched before the hard-coded library search path?
-shlibpath_overrides_runpath=$shlibpath_overrides_runpath
-
-# Format of library name prefix.
-libname_spec=$lt_libname_spec
-
-# List of archive names.  First name is the real one, the rest are links.
-# The last name is the one that the linker finds with -lNAME
-library_names_spec=$lt_library_names_spec
-
-# The coded name of the library, if different from the real name.
-soname_spec=$lt_soname_spec
-
-# Permission mode override for installation of shared libraries.
-install_override_mode=$lt_install_override_mode
-
-# Command to use after installation of a shared archive.
-postinstall_cmds=$lt_postinstall_cmds
-
-# Command to use after uninstallation of a shared archive.
-postuninstall_cmds=$lt_postuninstall_cmds
-
-# Commands used to finish a libtool library installation in a directory.
-finish_cmds=$lt_finish_cmds
-
-# As "finish_cmds", except a single script fragment to be evaled but
-# not shown.
-finish_eval=$lt_finish_eval
-
-# Whether we should hardcode library paths into libraries.
-hardcode_into_libs=$hardcode_into_libs
-
-# Compile-time system search path for libraries.
-sys_lib_search_path_spec=$lt_sys_lib_search_path_spec
-
-# Run-time system search path for libraries.
-sys_lib_dlsearch_path_spec=$lt_sys_lib_dlsearch_path_spec
-
-# Whether dlopen is supported.
-dlopen_support=$enable_dlopen
-
-# Whether dlopen of programs is supported.
-dlopen_self=$enable_dlopen_self
-
-# Whether dlopen of statically linked programs is supported.
-dlopen_self_static=$enable_dlopen_self_static
-
-# Commands to strip libraries.
-old_striplib=$lt_old_striplib
-striplib=$lt_striplib
-
-
-# The linker used to build libraries.
-LD=$lt_LD
-
-# How to create reloadable object files.
-reload_flag=$lt_reload_flag
-reload_cmds=$lt_reload_cmds
-
-# Commands used to build an old-style archive.
-old_archive_cmds=$lt_old_archive_cmds
-
-# A language specific compiler.
-CC=$lt_compiler
-
-# Is the compiler the GNU compiler?
-with_gcc=$GCC
-
-# Compiler flag to turn off builtin functions.
-no_builtin_flag=$lt_lt_prog_compiler_no_builtin_flag
-
-# Additional compiler flags for building library objects.
-pic_flag=$lt_lt_prog_compiler_pic
-
-# How to pass a linker flag through the compiler.
-wl=$lt_lt_prog_compiler_wl
-
-# Compiler flag to prevent dynamic linking.
-link_static_flag=$lt_lt_prog_compiler_static
-
-# Does compiler simultaneously support -c and -o options?
-compiler_c_o=$lt_lt_cv_prog_compiler_c_o
-
-# Whether or not to add -lc for building shared libraries.
-build_libtool_need_lc=$archive_cmds_need_lc
-
-# Whether or not to disallow shared libs when runtime libs are static.
-allow_libtool_libs_with_static_runtimes=$enable_shared_with_static_runtimes
-
-# Compiler flag to allow reflexive dlopens.
-export_dynamic_flag_spec=$lt_export_dynamic_flag_spec
-
-# Compiler flag to generate shared objects directly from archives.
-whole_archive_flag_spec=$lt_whole_archive_flag_spec
-
-# Whether the compiler copes with passing no objects directly.
-compiler_needs_object=$lt_compiler_needs_object
-
-# Create an old-style archive from a shared archive.
-old_archive_from_new_cmds=$lt_old_archive_from_new_cmds
-
-# Create a temporary old-style archive to link instead of a shared archive.
-old_archive_from_expsyms_cmds=$lt_old_archive_from_expsyms_cmds
-
-# Commands used to build a shared archive.
-archive_cmds=$lt_archive_cmds
-archive_expsym_cmds=$lt_archive_expsym_cmds
-
-# Commands used to build a loadable module if different from building
-# a shared archive.
-module_cmds=$lt_module_cmds
-module_expsym_cmds=$lt_module_expsym_cmds
-
-# Whether we are building with GNU ld or not.
-with_gnu_ld=$lt_with_gnu_ld
-
-# Flag that allows shared libraries with undefined symbols to be built.
-allow_undefined_flag=$lt_allow_undefined_flag
-
-# Flag that enforces no undefined symbols.
-no_undefined_flag=$lt_no_undefined_flag
-
-# Flag to hardcode \$libdir into a binary during linking.
-# This must work even if \$libdir does not exist
-hardcode_libdir_flag_spec=$lt_hardcode_libdir_flag_spec
-
-# Whether we need a single "-rpath" flag with a separated argument.
-hardcode_libdir_separator=$lt_hardcode_libdir_separator
-
-# Set to "yes" if using DIR/libNAME\${shared_ext} during linking hardcodes
-# DIR into the resulting binary.
-hardcode_direct=$hardcode_direct
-
-# Set to "yes" if using DIR/libNAME\${shared_ext} during linking hardcodes
-# DIR into the resulting binary and the resulting library dependency is
-# "absolute",i.e impossible to change by setting \${shlibpath_var} if the
-# library is relocated.
-hardcode_direct_absolute=$hardcode_direct_absolute
-
-# Set to "yes" if using the -LDIR flag during linking hardcodes DIR
-# into the resulting binary.
-hardcode_minus_L=$hardcode_minus_L
-
-# Set to "yes" if using SHLIBPATH_VAR=DIR during linking hardcodes DIR
-# into the resulting binary.
-hardcode_shlibpath_var=$hardcode_shlibpath_var
-
-# Set to "yes" if building a shared library automatically hardcodes DIR
-# into the library and all subsequent libraries and executables linked
-# against it.
-hardcode_automatic=$hardcode_automatic
-
-# Set to yes if linker adds runtime paths of dependent libraries
-# to runtime path list.
-inherit_rpath=$inherit_rpath
-
-# Whether libtool must link a program against all its dependency libraries.
-link_all_deplibs=$link_all_deplibs
-
-# Set to "yes" if exported symbols are required.
-always_export_symbols=$always_export_symbols
-
-# The commands to list exported symbols.
-export_symbols_cmds=$lt_export_symbols_cmds
-
-# Symbols that should not be listed in the preloaded symbols.
-exclude_expsyms=$lt_exclude_expsyms
-
-# Symbols that must always be exported.
-include_expsyms=$lt_include_expsyms
-
-# Commands necessary for linking programs (against libraries) with templates.
-prelink_cmds=$lt_prelink_cmds
-
-# Commands necessary for finishing linking programs.
-postlink_cmds=$lt_postlink_cmds
-
-# Specify filename containing input files.
-file_list_spec=$lt_file_list_spec
-
-# How to hardcode a shared library path into an executable.
-hardcode_action=$hardcode_action
-
-# The directories searched by this compiler when creating a shared library.
-compiler_lib_search_dirs=$lt_compiler_lib_search_dirs
-
-# Dependencies to place before and after the objects being linked to
-# create a shared library.
-predep_objects=$lt_predep_objects
-postdep_objects=$lt_postdep_objects
-predeps=$lt_predeps
-postdeps=$lt_postdeps
-
-# The library search path used internally by the compiler when linking
-# a shared library.
-compiler_lib_search_path=$lt_compiler_lib_search_path
-
-# ### END LIBTOOL CONFIG
-
-_LT_EOF
-
-  case $host_os in
-  aix3*)
-    cat <<\_LT_EOF >> "$cfgfile"
-# AIX sometimes has problems with the GCC collect2 program.  For some
-# reason, if we set the COLLECT_NAMES environment variable, the problems
-# vanish in a puff of smoke.
-if test "X${COLLECT_NAMES+set}" != Xset; then
-  COLLECT_NAMES=
-  export COLLECT_NAMES
-fi
-_LT_EOF
-    ;;
-  esac
-
-
-ltmain="$ac_aux_dir/ltmain.sh"
-
-
-  # We use sed instead of cat because bash on DJGPP gets confused if
-  # if finds mixed CR/LF and LF-only lines.  Since sed operates in
-  # text mode, it properly converts lines to CR/LF.  This bash problem
-  # is reportedly fixed, but why not run on old versions too?
-  sed '$q' "$ltmain" >> "$cfgfile" \
-     || (rm -f "$cfgfile"; exit 1)
-
-  if test x"$xsi_shell" = xyes; then
-  sed -e '/^func_dirname ()$/,/^} # func_dirname /c\
-func_dirname ()\
-{\
-\    case ${1} in\
-\      */*) func_dirname_result="${1%/*}${2}" ;;\
-\      *  ) func_dirname_result="${3}" ;;\
-\    esac\
-} # Extended-shell func_dirname implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_basename ()$/,/^} # func_basename /c\
-func_basename ()\
-{\
-\    func_basename_result="${1##*/}"\
-} # Extended-shell func_basename implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_dirname_and_basename ()$/,/^} # func_dirname_and_basename /c\
-func_dirname_and_basename ()\
-{\
-\    case ${1} in\
-\      */*) func_dirname_result="${1%/*}${2}" ;;\
-\      *  ) func_dirname_result="${3}" ;;\
-\    esac\
-\    func_basename_result="${1##*/}"\
-} # Extended-shell func_dirname_and_basename implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_stripname ()$/,/^} # func_stripname /c\
-func_stripname ()\
-{\
-\    # pdksh 5.2.14 does not do ${X%$Y} correctly if both X and Y are\
-\    # positional parameters, so assign one to ordinary parameter first.\
-\    func_stripname_result=${3}\
-\    func_stripname_result=${func_stripname_result#"${1}"}\
-\    func_stripname_result=${func_stripname_result%"${2}"}\
-} # Extended-shell func_stripname implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_split_long_opt ()$/,/^} # func_split_long_opt /c\
-func_split_long_opt ()\
-{\
-\    func_split_long_opt_name=${1%%=*}\
-\    func_split_long_opt_arg=${1#*=}\
-} # Extended-shell func_split_long_opt implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_split_short_opt ()$/,/^} # func_split_short_opt /c\
-func_split_short_opt ()\
-{\
-\    func_split_short_opt_arg=${1#??}\
-\    func_split_short_opt_name=${1%"$func_split_short_opt_arg"}\
-} # Extended-shell func_split_short_opt implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_lo2o ()$/,/^} # func_lo2o /c\
-func_lo2o ()\
-{\
-\    case ${1} in\
-\      *.lo) func_lo2o_result=${1%.lo}.${objext} ;;\
-\      *)    func_lo2o_result=${1} ;;\
-\    esac\
-} # Extended-shell func_lo2o implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_xform ()$/,/^} # func_xform /c\
-func_xform ()\
-{\
-    func_xform_result=${1%.*}.lo\
-} # Extended-shell func_xform implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_arith ()$/,/^} # func_arith /c\
-func_arith ()\
-{\
-    func_arith_result=$(( $* ))\
-} # Extended-shell func_arith implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_len ()$/,/^} # func_len /c\
-func_len ()\
-{\
-    func_len_result=${#1}\
-} # Extended-shell func_len implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-fi
-
-if test x"$lt_shell_append" = xyes; then
-  sed -e '/^func_append ()$/,/^} # func_append /c\
-func_append ()\
-{\
-    eval "${1}+=\\${2}"\
-} # Extended-shell func_append implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  sed -e '/^func_append_quoted ()$/,/^} # func_append_quoted /c\
-func_append_quoted ()\
-{\
-\    func_quote_for_eval "${2}"\
-\    eval "${1}+=\\\\ \\$func_quote_for_eval_result"\
-} # Extended-shell func_append_quoted implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-
-
-  # Save a `func_append' function call where possible by direct use of '+='
-  sed -e 's%func_append \([a-zA-Z_]\{1,\}\) "%\1+="%g' $cfgfile > $cfgfile.tmp \
-    && mv -f "$cfgfile.tmp" "$cfgfile" \
-      || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-  test 0 -eq $? || _lt_function_replace_fail=:
-else
-  # Save a `func_append' function call even when '+=' is not available
-  sed -e 's%func_append \([a-zA-Z_]\{1,\}\) "%\1="$\1%g' $cfgfile > $cfgfile.tmp \
-    && mv -f "$cfgfile.tmp" "$cfgfile" \
-      || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-  test 0 -eq $? || _lt_function_replace_fail=:
-fi
-
-if test x"$_lt_function_replace_fail" = x":"; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: Unable to substitute extended shell functions in $ofile" >&5
-$as_echo "$as_me: WARNING: Unable to substitute extended shell functions in $ofile" >&2;}
-fi
-
-
-   mv -f "$cfgfile" "$ofile" ||
-    (rm -f "$ofile" && cp "$cfgfile" "$ofile" && rm -f "$cfgfile")
-  chmod +x "$ofile"
-
-
-    cat <<_LT_EOF >> "$ofile"
-
-# ### BEGIN LIBTOOL TAG CONFIG: CXX
-
-# The linker used to build libraries.
-LD=$lt_LD_CXX
-
-# How to create reloadable object files.
-reload_flag=$lt_reload_flag_CXX
-reload_cmds=$lt_reload_cmds_CXX
-
-# Commands used to build an old-style archive.
-old_archive_cmds=$lt_old_archive_cmds_CXX
-
-# A language specific compiler.
-CC=$lt_compiler_CXX
-
-# Is the compiler the GNU compiler?
-with_gcc=$GCC_CXX
-
-# Compiler flag to turn off builtin functions.
-no_builtin_flag=$lt_lt_prog_compiler_no_builtin_flag_CXX
-
-# Additional compiler flags for building library objects.
-pic_flag=$lt_lt_prog_compiler_pic_CXX
-
-# How to pass a linker flag through the compiler.
-wl=$lt_lt_prog_compiler_wl_CXX
-
-# Compiler flag to prevent dynamic linking.
-link_static_flag=$lt_lt_prog_compiler_static_CXX
-
-# Does compiler simultaneously support -c and -o options?
-compiler_c_o=$lt_lt_cv_prog_compiler_c_o_CXX
-
-# Whether or not to add -lc for building shared libraries.
-build_libtool_need_lc=$archive_cmds_need_lc_CXX
-
-# Whether or not to disallow shared libs when runtime libs are static.
-allow_libtool_libs_with_static_runtimes=$enable_shared_with_static_runtimes_CXX
-
-# Compiler flag to allow reflexive dlopens.
-export_dynamic_flag_spec=$lt_export_dynamic_flag_spec_CXX
-
-# Compiler flag to generate shared objects directly from archives.
-whole_archive_flag_spec=$lt_whole_archive_flag_spec_CXX
-
-# Whether the compiler copes with passing no objects directly.
-compiler_needs_object=$lt_compiler_needs_object_CXX
-
-# Create an old-style archive from a shared archive.
-old_archive_from_new_cmds=$lt_old_archive_from_new_cmds_CXX
-
-# Create a temporary old-style archive to link instead of a shared archive.
-old_archive_from_expsyms_cmds=$lt_old_archive_from_expsyms_cmds_CXX
-
-# Commands used to build a shared archive.
-archive_cmds=$lt_archive_cmds_CXX
-archive_expsym_cmds=$lt_archive_expsym_cmds_CXX
-
-# Commands used to build a loadable module if different from building
-# a shared archive.
-module_cmds=$lt_module_cmds_CXX
-module_expsym_cmds=$lt_module_expsym_cmds_CXX
-
-# Whether we are building with GNU ld or not.
-with_gnu_ld=$lt_with_gnu_ld_CXX
-
-# Flag that allows shared libraries with undefined symbols to be built.
-allow_undefined_flag=$lt_allow_undefined_flag_CXX
-
-# Flag that enforces no undefined symbols.
-no_undefined_flag=$lt_no_undefined_flag_CXX
-
-# Flag to hardcode \$libdir into a binary during linking.
-# This must work even if \$libdir does not exist
-hardcode_libdir_flag_spec=$lt_hardcode_libdir_flag_spec_CXX
-
-# Whether we need a single "-rpath" flag with a separated argument.
-hardcode_libdir_separator=$lt_hardcode_libdir_separator_CXX
-
-# Set to "yes" if using DIR/libNAME\${shared_ext} during linking hardcodes
-# DIR into the resulting binary.
-hardcode_direct=$hardcode_direct_CXX
-
-# Set to "yes" if using DIR/libNAME\${shared_ext} during linking hardcodes
-# DIR into the resulting binary and the resulting library dependency is
-# "absolute",i.e impossible to change by setting \${shlibpath_var} if the
-# library is relocated.
-hardcode_direct_absolute=$hardcode_direct_absolute_CXX
-
-# Set to "yes" if using the -LDIR flag during linking hardcodes DIR
-# into the resulting binary.
-hardcode_minus_L=$hardcode_minus_L_CXX
-
-# Set to "yes" if using SHLIBPATH_VAR=DIR during linking hardcodes DIR
-# into the resulting binary.
-hardcode_shlibpath_var=$hardcode_shlibpath_var_CXX
-
-# Set to "yes" if building a shared library automatically hardcodes DIR
-# into the library and all subsequent libraries and executables linked
-# against it.
-hardcode_automatic=$hardcode_automatic_CXX
-
-# Set to yes if linker adds runtime paths of dependent libraries
-# to runtime path list.
-inherit_rpath=$inherit_rpath_CXX
-
-# Whether libtool must link a program against all its dependency libraries.
-link_all_deplibs=$link_all_deplibs_CXX
-
-# Set to "yes" if exported symbols are required.
-always_export_symbols=$always_export_symbols_CXX
-
-# The commands to list exported symbols.
-export_symbols_cmds=$lt_export_symbols_cmds_CXX
-
-# Symbols that should not be listed in the preloaded symbols.
-exclude_expsyms=$lt_exclude_expsyms_CXX
-
-# Symbols that must always be exported.
-include_expsyms=$lt_include_expsyms_CXX
-
-# Commands necessary for linking programs (against libraries) with templates.
-prelink_cmds=$lt_prelink_cmds_CXX
-
-# Commands necessary for finishing linking programs.
-postlink_cmds=$lt_postlink_cmds_CXX
-
-# Specify filename containing input files.
-file_list_spec=$lt_file_list_spec_CXX
-
-# How to hardcode a shared library path into an executable.
-hardcode_action=$hardcode_action_CXX
-
-# The directories searched by this compiler when creating a shared library.
-compiler_lib_search_dirs=$lt_compiler_lib_search_dirs_CXX
-
-# Dependencies to place before and after the objects being linked to
-# create a shared library.
-predep_objects=$lt_predep_objects_CXX
-postdep_objects=$lt_postdep_objects_CXX
-predeps=$lt_predeps_CXX
-postdeps=$lt_postdeps_CXX
-
-# The library search path used internally by the compiler when linking
-# a shared library.
-compiler_lib_search_path=$lt_compiler_lib_search_path_CXX
-
-# ### END LIBTOOL TAG CONFIG: CXX
-_LT_EOF
-
- ;;
-
-  esac
-done # for ac_tag
-
-
-as_fn_exit 0
-_ACEOF
-ac_clean_files=$ac_clean_files_save
-
-test $ac_write_fail = 0 ||
-  as_fn_error $? "write failure creating $CONFIG_STATUS" "$LINENO" 5
-
-
-# configure is writing to config.log, and then calls config.status.
-# config.status does its own redirection, appending to config.log.
-# Unfortunately, on DOS this fails, as config.log is still kept open
-# by configure, so config.status won't be able to write to it; its
-# output is simply discarded.  So we exec the FD to /dev/null,
-# effectively closing config.log, so it can be properly (re)opened and
-# appended to by config.status.  When coming back to configure, we
-# need to make the FD available again.
-if test "$no_create" != yes; then
-  ac_cs_success=:
-  ac_config_status_args=
-  test "$silent" = yes &&
-    ac_config_status_args="$ac_config_status_args --quiet"
-  exec 5>/dev/null
-  $SHELL $CONFIG_STATUS $ac_config_status_args || ac_cs_success=false
-  exec 5>>config.log
-  # Use ||, not &&, to avoid exiting from the if with $? = 1, which
-  # would make configure fail if this is the last instruction.
-  $ac_cs_success || as_fn_exit 1
-fi
-if test -n "$ac_unrecognized_opts" && test "$enable_option_checking" != no; then
-  { $as_echo "$as_me:${as_lineno-$LINENO}: WARNING: unrecognized options: $ac_unrecognized_opts" >&5
-$as_echo "$as_me: WARNING: unrecognized options: $ac_unrecognized_opts" >&2;}
-fi
-
diff --git a/sandbox/hurwitz.kroeker/src/float/configure.ac b/sandbox/hurwitz.kroeker/src/float/configure.ac
deleted file mode 100644
index 0a0fe9f..0000000
--- a/sandbox/hurwitz.kroeker/src/float/configure.ac
+++ /dev/null
@@ -1,602 +0,0 @@
-#############################################################################
-##
-#W  configure.ac                                            Laurent Bartholdi
-##                                                              Jakob Kroeker
-##
-#H   @(#)$Id$
-##
-#Y Copyright (C) 2009, Laurent Bartholdi
-##
-#############################################################################
-AC_PREREQ(2.67)
-LT_PREREQ([2.4.2])
-AC_INIT( [float], 4.0 ,laurent.bartholdi@gmail.com )
-AC_CONFIG_SRCDIR([src/mp_float.h])
-#AC_CONFIG_HEADER([src/pkgconfig.h:cnf/pkgconfig.h.in])
-AC_CONFIG_MACRO_DIR([m4])
-AC_CONFIG_AUX_DIR([cnf])
-AM_INIT_AUTOMAKE([foreign])
-AM_MAINTAINER_MODE
-LT_INIT([disable-static dlopen win32-dll])
-
-
-# Checks for programs.
-AC_PROG_CC
-AC_PROG_CXX
-
-############################################################################################################ 
-################## detect downloader wget(Linux) / curl(Mac OS)
-
-### todo: check if works as expected
-
-GETBIN=""
-GETBINPARAM=""
-
-AC_PATH_TOOL([GETBIN], [wget] )
-
-
-if test "$GETBIN" != ""; then
-GETBINPARAM=" -k --no-verbose --no-check-certificate "
-else
-    AC_PATH_TOOL([GETBIN], [curl] )
-    if test "$GETBIN" != ""; then
-       # see http://curl.haxx.se/docs/manpage.html for params! 
-       GETBINPARAM=" -L -C - -O " 
-    fi;
-fi;
-
-if test "$GETBIN" = ""; then
-   AC_ERROR([Could not locate 'wget' or 'curl'; please install! ] )
-fi;
-
-AC_SUBST(GETBIN)
-AC_SUBST(GETBINPARAM)
-###################################################### 
-
-
-AC_ARG_ENABLE(static,
- [  --enable-static  Enable static library build]
- )
- 
- AC_ARG_ENABLE(shared,
- [  --enable-shared  Disable shared library build]
- )
-
-CONFIGUREPARAMS=" "
-
-if test "$enable_static" = yes; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-static "
-   #else
-   #CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-static "
-fi;
-
-if test "$enable_shared" = no; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-shared "
-   else
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-shared "
-fi;
-AC_SUBST(CONFIGUREPARAMS)
-######################################################  
-
-
-GAC_stack_protector_flag="" 
-
-# Check for -fno-stack-protector, because we link within GAP
-AC_CACHE_CHECK([whether $CC accepts -fno-stack-protector],
-    [ns_cv_cc__nostackprotector],
-    [save_CFLAGS=$CFLAGS
-     CFLAGS="$CFLAGS -fno-stack-protector"
-     AC_LINK_IFELSE([AC_LANG_PROGRAM([], [])],
-                    [ns_cv_cc__nostackprotector=yes],
-                    [ns_cv_cc__nostackprotector=no])
-     CFLAGS=$save_CFLAGS])
-if test $ns_cv_cc__nostackprotector = yes; then
-     CFLAGS=" $CFLAGS -fno-stack-protector "
-     GAC_stack_protector_flag=" -p -fno-stack-protector "
-fi
-AC_SUBST(GAC_stack_protector_flag)
-######################################################  
-
-AC_ARG_VAR([GAPDIR], [Location of the GAP root directory, e.g. ../..])
-
-if test -z "$GAPDIR"; then
-    for dir in ../.. /Applications/gap4r5; do
-        if test -f $dir/sysinfo.gap; then
-            GAPDIR=$dir
-            break
-        fi
-    done
-fi
-
-AC_ARG_VAR([CONFIGNAME],[Name of GAP build configuration])
-if test -n "$CONFIGNAME"; then
-    SYSINFO="$GAPDIR/sysinfo.gap-$CONFIGNAME"
-    MAKEFILE="Makefile-$CONFIGNAME"
-    GAPPROG="$GAPDIR/bin/gap-$CONFIGNAME.sh"
-else
-    SYSINFO="$GAPDIR/sysinfo.gap"
-    MAKEFILE="Makefile"
-    GAPPROG="$GAPDIR/bin/gap.sh"
-fi
-
-if ! test -f "$SYSINFO"; then
-    AC_ERROR([Could not locate the GAP root directory;
-        specify its location with './configure GAPDIR=DIR [CONFIGNAME=NAME)]'])
-fi
-
-GAPDIR=`cd "$GAPDIR" && pwd` # make path absolute
-AC_SUBST(GAPDIR)
-
-. "$SYSINFO"
-TARGET="$GAParch"
-
-echo checking target... "$TARGET"
-
-XTARGET="`cnf/config.guess`-$CC-`echo $TARGET | sed 's/.*-//'`"
-if test "$XTARGET" != "$GAParch_system"; then
-   AC_WARN([The guessed target $XTARGET is not the gap target $GAParch_system. Cross your fingers])
-fi
-AC_SUBST(TARGET)
-
-echo checking gap executable ... "$GAPPROG"
-
-if ! test -e "$GAPPROG"; then
-    AC_ERROR([Could not find GAP executable $GAPPROG])
-fi
-AC_SUBST(GAPPROG)
-
-GAC="$GAPDIR/bin/$TARGET/gac"
-
-echo checking gac compiler... $GAC
-
-if ! test -e "$GAC"; then
-    AC_ERROR([Could not find GAP compiler $GAC])
-fi
-AC_SUBST(GAC)
-
-################################################################
-# gmp configuration
-
-GMPDIR="$GAPDIR/bin/$TARGET/extern/gmp"
-GMPINCLUDE=""
-GMPLIB=""
-
-AC_ARG_WITH(gmp,
- [  --with-gmp=<location>|yes|no|gap
-    Location at which the GMP library, needed for MPFR, was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "gap", which is the default, asks MPFR
-    to use the version of gmp included in the GAP distribution.
- ],
- [if test "$withval" != gap; then GMPDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(gmp-include,
- [  --with-gmp-include=<location>
-    Location at which the GMP include files were installed.],
- [GMPINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(gmp-lib,
- [  --with-gmp-lib=<location>
-    Location at which the GMP library files were installed.],
- [GMPLIB="$withval"]
-)
-
-if test "$GMPDIR" != yes; then
-if test "$GMPINCLUDE" == ""; then GMPINCLUDE="$GMPDIR/include"; fi
-if test "$GMPLIB" == ""; then GMPLIB="$GMPDIR/lib"; fi
-fi
-
-################################################################
-# mpfr configuration
-
-EXTERN="\$(CURDIR)/bin/$TARGET/extern"
-
-MPFRDIR="$EXTERN"
-MPFRINCLUDE=""
-MPFRLIB=""
-
-AC_ARG_WITH(mpfr,
- [  --with-mpfr=<path>|yes|no|extern
-    Location at which the MPFR library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of mpfr in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then MPFRDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(mpfr-include,
- [  --with-mpfr-include=<location>
-    Location at which the MPFR include files were installed.],
- [MPFRINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(mpfr-lib,
- [  --with-mpfr-lib=<location>
-    Location at which the MPFR library files were installed.],
- [MPFRLIB="$withval"]
-)
-
-if test "$MPFRDIR" != yes; then
-if test "$MPFRINCLUDE" == ""; then MPFRINCLUDE="$MPFRDIR/include"; fi
-if test "$MPFRLIB" == ""; then MPFRLIB="$MPFRDIR/lib"; fi
-fi
-
-################################################################
-# mpfi configuration
-
-if test "MPFRDIR" != no; then
-
-MPFIDIR="$EXTERN"
-MPFIINCLUDE=""
-MPFILIB=""
-
-AC_ARG_WITH(mpfi,
- [  --with-mpfi=<path>|yes|no|extern
-    Location at which the MPFI library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of mpfi in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then MPFIDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(mpfi-include,
- [  --with-mpfi-include=<location>
-    Location at which the MPFI include files were installed.],
- [MPFIINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(mpfi-lib,
- [  --with-mpfi-lib=<location>
-    Location at which the MPFI library files were installed.],
- [MPFILIB="$withval"]
-)
-
-if test "$MPFIDIR" != yes; then
-if test "$MPFIINCLUDE" == ""; then MPFIINCLUDE="$MPFIDIR/include"; fi
-if test "$MPFILIB" == ""; then MPFILIB="$MPFIDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# mpc configuration
-
-if test "$MPFRDIR" != no; then
-
-MPCDIR="$EXTERN"
-MPCINCLUDE=""
-MPCLIB=""
-
-AC_ARG_WITH(mpc,
- [  --with-mpc=<path>|yes|no|extern
-    Location at which the MPC library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of mpc in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then MPCDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(mpc-include,
- [  --with-mpc-include=<location>
-    Location at which the MPC include files were installed.],
- [MPCINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(mpc-lib,
- [  --with-mpc-lib=<location>
-    Location at which the MPC library files were installed.],
- [MPCLIB="$withval"]
-)
-
-if test "$MPCDIR" != yes; then
-if test "$MPCINCLUDE" == ""; then MPCINCLUDE="$MPCDIR/include"; fi
-if test "$MPCLIB" == ""; then MPCLIB="$MPCDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# fplll configuration
-
-if test "$MPFRDIR" != no; then
-
-FPLLLDIR="$EXTERN"
-FPLLLINCLUDE=""
-FPLLLLIB=""
-
-AC_ARG_WITH(fplll,
- [  --with-fplll=<path>|yes|no|extern
-    Location at which the FPLLL library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of fplll in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then FPLLLDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(fplll-include,
- [  --with-fplll-include=<location>
-    Location at which the FPLLL include files were installed.],
- [FPLLLINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(fplll-lib,
- [  --with-fplll-lib=<location>
-    Location at which the FPLLL library files were installed.],
- [FPLLLLIB="$withval"]
-)
-
-if test "$FPLLLDIR" != yes; then
-if test "$FPLLLINCLUDE" == ""; then FPLLLINCLUDE="$FPLLLDIR/include"; fi
-if test "$FPLLLLIB" == ""; then FPLLLLIB="$FPLLLDIR/lib"; fi
-fi
-
-fi
-
-################################################################
-# cxsc configuration
-
-CXSCDIR="$EXTERN"
-CXSCINCLUDE=""
-CXSCLIB=""
-
-AC_ARG_WITH(cxsc,
- [  --with-cxsc=<path>|yes|no|extern
-    Location at which the CXSC library was installed.
-    If the argument is omitted, the library is assumed to be reachable
-    under the standard search path (/usr, /usr/local,...).  Otherwise
-    you must give the <path> to the directory which contains the
-    library. The special value "extern", which is the default, asks Float
-    to compile a version of cxsc in the subdirectory extern/.
- ],
- [if test "$withval" != extern; then CXSCDIR="$withval"; fi]
-)
-
-AC_ARG_WITH(cxsc-include,
- [  --with-cxsc-include=<location>
-    Location at which the CXSC include files were installed.],
- [CXSCINCLUDE="$withval"]
-)
-
-AC_ARG_WITH(cxsc-lib,
- [  --with-cxsc-lib=<location>
-    Location at which the CXSC library files were installed.],
- [CXSCLIB="$withval"]
-)
-
-if test "$CXSCDIR" != yes; then
-if test "$CXSCINCLUDE" == ""; then CXSCINCLUDE="$CXSCDIR/include"; fi
-if test "$CXSCLIB" == ""; then CXSCLIB="$CXSCDIR/lib"; fi
-fi
-
-################################################################
-# make target mpfr
-
-echo using GMP directory... $GMPDIR
-echo using MPFR directory... $MPFRDIR
-echo using MPFI directory... $MPFIDIR
-echo using MPC directory... $MPCDIR
-echo using FPLLL directory... $FPLLLDIR
-echo using CXSC directory... $CXSCDIR
-
-GACFLAGS=""
-DLL_TARGET="\$(LOCALBIN)"
-LIB_TARGET=""
-
-if test "$MPFRDIR" != no; then
-
-MP_FLOAT_LIB=""
-MP_FLOAT_O="\$(LOCALBIN)/mp_float.o"
-DLL_TARGET="$DLL_TARGET \$(LOCALBIN)/mp_float.so"
-
-# check gmp presence
-if test "$GMPINCLUDE" != ""; then
-   CPPFLAGS="$CPPFLAGS -I$GMPINCLUDE"
-   GACFLAGS="$GACFLAGS -p -I$GMPINCLUDE"
-fi
-AC_CHECK_HEADER(gmp.h,[],[AC_MSG_ERROR([library gmp not found. Specify its location using --with-gmp])],[])
-
-# buggy darwin doesn't chain the dll requirements to gmp; we include it again
-if test "$GMPLIB" != ""; then
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$GMPLIB -L -Wl,-rpath,$GMPLIB"
-fi
-MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lgmp"
-
-# check mpfr presence
-if test "$MPFRINCLUDE" != ""; then
-   CPPFLAGS="$CPPFLAGS -I$MPFRINCLUDE"
-   GACFLAGS="$GACFLAGS -p -I$MPFRINCLUDE"
-fi
-if test "$MPFRDIR" == "$EXTERN"; then
-   LIB_TARGET="$LIB_TARGET mpfrlib"
-else
-   AC_CHECK_HEADER(mpfr.h,[],[AC_MSG_ERROR([library mpfr not found. Specify its location, or disable it using --without-mpfr])],[])
-fi
-GACFLAGS="$GACFLAGS -p -DWITH_MPFR"
-if test "$MPFRLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPFRLIB -L -Wl,-rpath,$MPFRLIB"; fi
-MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpfr"
-MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpfr.o"
-
-# check mpfi presence
-if test "$MPFIDIR" != no; then
-   if test "$MPFIINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$MPFIINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$MPFIINCLUDE"
-   fi
-   if test "$MPFIDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET mpfilib"
-   else
-      AC_CHECK_HEADER(mpfi.h,[],[AC_MSG_ERROR([library mpfi not found. Specify its location, or disable it using --without-mpfi])],[#include <mpfr.h>])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_MPFI"
-   if test "$MPFILIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPFILIB -L -Wl,-rpath,$MPFILIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpfi"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpfi.o"
-fi
-
-# check mpc presence
-if test "$MPCDIR" != no; then
-   if test "$MPCINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$MPCINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$MPCINCLUDE"
-   fi
-   if test "$MPCDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET mpclib"
-   else
-      AC_CHECK_HEADER(mpc.h,[],[AC_MSG_ERROR([library mpc not found. Specify its location, or disable it using --without-mpc])],[#include <mpfr.h>])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_MPC"
-   if test "$MPCLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$MPCLIB -L -Wl,-rpath,$MPCLIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lmpc"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/mpc.o \$(LOCALBIN)/mp_poly.o"
-fi
-
-# check fplll presence
-if test "$FPLLLDIR" != no; then
-   if test "$FPLLLINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$FPLLLINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$FPLLLINCLUDE"
-   fi
-   if test "$FPLLLDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET fpllllib"
-   else
-      AC_CHECK_HEADER(fplll.h,[],[AC_MSG_ERROR([library fplll not found. Specify its location, or disable it using --without-fplll])],[#include <mpfr.h>])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_FPLLL"
-   if test "$FPLLLLIB" != ""; then MP_FLOAT_LIB="$MP_FLOAT_LIB -L -L$FPLLLLIB -L -Wl,-rpath,$FPLLLLIB"; fi
-   MP_FLOAT_LIB="$MP_FLOAT_LIB -L -lfplll"
-   MP_FLOAT_O="$MP_FLOAT_O \$(LOCALBIN)/fplll.o"
-fi
-
-fi
-
-################################################################
-# make target cxsc
-
-if test "$CXSCDIR" != no; then
-   CXSC_FLOAT_LIB=""
-   CXSC_FLOAT_O=""
-
-   if test "CXSCINCLUDE" != ""; then
-      CPPFLAGS="$CPPFLAGS -I$CXSCINCLUDE"
-      GACFLAGS="$GACFLAGS -p -I$CXSCINCLUDE"
-   fi
-   if test "$CXSCDIR" == "$EXTERN"; then
-      LIB_TARGET="$LIB_TARGET cxsclib"
-   else
-      AC_LANG([C++])
-      AC_CHECK_HEADER(interval.hpp,[],[AC_MSG_ERROR([library cxsc not found. Specify its location, or disable using --without-cxsc])],[])
-   fi
-   GACFLAGS="$GACFLAGS -p -DWITH_CXSC"
-   DLL_TARGET="$DLL_TARGET \$(LOCALBIN)/cxsc_float.so"
-   CXSC_FLOAT_O="\$(LOCALBIN)/cxsc_float.o \$(LOCALBIN)/cxsc_poly.o"
-   if test "$CXSCLIB" != ""; then CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L -L$CXSCLIB -L -Wl,-rpath,$CXSCLIB"; fi
-   if echo "$TARGET" | grep -qi darwin; then # buggy darwin, can't include dll
-      CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L $CXSCLIB/libcxsc.a"
-   else
-      CXSC_FLOAT_LIB="$CXSC_FLOAT_LIB -L -lcxsc"
-   fi
-fi
-
-################################################################
-# generate files
-
-WITHGMP=""
-INCLGMP=""
-LINKGMP=""
-if test "$GMPINCLUDE" != ""; then
-   WITHGMP="$WITHGMP --with-gmp-include=$GMPINCLUDE"
-   INCLGMP="-I$GMPINCLUDE"
-fi
-if test "$GMPLIB" != ""; then
-   WITHGMP="$WITHGMP --with-gmp-lib=$GMPLIB"
-   LINKGMP="-L$GMPLIB"
-fi
-WITHMPFR=""
-INCLMPFR=""
-LINKMPFR=""
-if test "$MPFRINCLUDE" != ""; then
-   WITHMPFR="$WITHMPFR --with-mpfr-include=$MPFRINCLUDE"
-   INCLMPFR="-I$MPFRINCLUDE"
-fi
-if test "$MPFRLIB" != ""; then
-   WITHMPFR="$WITHMPFR --with-mpfr-lib=$MPFRLIB"
-   LINKMPFR="-L$MPFRLIB"
-fi
-
-# prevent parallel make on mpfr, mpc, mpfi before mpfr is compiled
-if test "$MPFRDIR" == "$EXTERN"; then MPFRDEPEND=mpfrlib; fi
-
-AC_SUBST(GAC)
-AC_SUBST(GAP)
-AC_SUBST(CC)
-AC_SUBST(CXX)
-AC_SUBST(CFLAGS)
-AC_SUBST(GAPDIR)
-AC_SUBST(TARGET)
-AC_SUBST(DLL_TARGET)
-AC_SUBST(LIB_TARGET)
-AC_SUBST(MP_FLOAT_LIB)
-AC_SUBST(MP_FLOAT_O)
-AC_SUBST(CXSC_FLOAT_LIB)
-AC_SUBST(CXSC_FLOAT_O)
-AC_SUBST(GACFLAGS)
-AC_SUBST(WITHGMP)
-AC_SUBST(INCLGMP)
-AC_SUBST(LINKGMP)
-AC_SUBST(WITHMPFR)
-AC_SUBST(INCLMPFR)
-AC_SUBST(LINKMPFR)
-AC_SUBST(MPFRDEPEND)
-
-mkdir -p bin/$TARGET
-CONFIG_STATUS=config.status
-
-
-AC_CHECK_FUNCS([gethostbyname gettimeofday gmtime localtime getpid getppid kill gethostname ])
-
-
-AC_CYGWIN
-AM_CONDITIONAL([SYS_IS_CYGWIN], [test "$CYGWIN" = "yes"])
-if test "$CYGWIN" = "yes"; then
-  AC_DEFINE(SYS_IS_CYGWIN32, 1, are we on CYGWIN?)
-else
-  AC_DEFINE(SYS_IS_CYGWIN32, 0, are we on CYGWIN?)
-fi
-
-
-
-case "$host" in
-        *-darwin* )
-        AC_DEFINE(SYS_IS_DARWIN, 1, are we on DARWIN?)
-        ;;
-        * )
-        AC_DEFINE(SYS_IS_DARWIN, 0, are we on DARWIN?)
-        ;;
-esac
-     
-AC_CONFIG_FILES([Makefile])
-
-
-#AC_CONFIG_FILES([$MAKEFILE:cnf/Makefile.am])
-
-#if test "$MAKEFILE" != Makefile; then
-#   ln -sf "$MAKEFILE" Makefile
-#fi
-
-AC_OUTPUT
diff --git a/sandbox/hurwitz.kroeker/src/float/configure.cxsc.ac b/sandbox/hurwitz.kroeker/src/float/configure.cxsc.ac
deleted file mode 100644
index d415c19..0000000
--- a/sandbox/hurwitz.kroeker/src/float/configure.cxsc.ac
+++ /dev/null
@@ -1,125 +0,0 @@
-#############################################################################
-##
-#W  configure.ac                                            
-##                                                              Jakob Kroeker
-##
-##
-#############################################################################
-AC_PREREQ(2.67)
-LT_PREREQ([2.4.2])
-AC_INIT( [cxsc], 2.5.1 , kroeker@uni-math.gwdg.de )
-AC_CONFIG_SRCDIR([src/cxsc_blas.hpp])
-#AC_CONFIG_HEADER([src/pkgconfig.h:cnf/pkgconfig.h.in])
-AC_CONFIG_MACRO_DIR([m4])
-AC_CONFIG_AUX_DIR([cnf])
-#AM_INIT_AUTOMAKE([foreign])
-AM_MAINTAINER_MODE
-#LT_INIT([disable-static dlopen win32-dll])
-
-
-# Checks for programs.
-AC_PROG_CC
-AC_PROG_CXX
-
-############################################################################################################ 
-################## detect downloader wget(Linux) / curl(Mac OS)
-
-### todo: check if works as expected
-
-GETBIN=""
-GETBINPARAM=""
-
-AC_PATH_TOOL([GETBIN], [wget] )
-
-
-
-AC_ARG_ENABLE(static,
- [  --enable-static  Enable static library build]
- )
- 
- AC_ARG_ENABLE(shared,
- [  --enable-shared  Disable shared library build]
- )
-
-CONFIGUREPARAMS=" "
-
-if test "$enable_static" = yes; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-static "
-   #else
-   #CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-static "
-fi;
-
-if test "$enable_shared" = no; then
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --disable-shared "
-   else
-   CONFIGUREPARAMS="$CONFIGUREPARAMS --enable-shared "
-fi;
-AC_SUBST(CONFIGUREPARAMS)
-######################################################  
-
-
-cxsc_mfpmath_flag="" 
-
-# Check for -mfpmath=sse 
-AC_CACHE_CHECK([whether $CC accepts -mfpmath=sse ],
-    [ns_cv_cc__mfpmath],
-    [save_CFLAGS=$CFLAGS
-     CFLAGS="$CFLAGS -mfpmath=sse"
-     AC_LINK_IFELSE([AC_LANG_PROGRAM([], [])],
-                    [ns_cv_cc__mfpmath=yes],
-                    [ns_cv_cc__mfpmath=no])
-     CFLAGS=$save_CFLAGS])
-if test $ns_cv_cc__mfpmath = yes; then
-     CFLAGS=" $CFLAGS -mfpmath=sse "
-     cxsc_mfpmath_flag=" -mfpmath=sse "     
-fi
-
-AC_SUBST(cxsc_mfpmath_flag)
-
-######################################################  
-
-
-AC_SUBST(CC)
-AC_SUBST(CXX)
-AC_SUBST(CFLAGS)
-AC_SUBST(GAPDIR)
-AC_SUBST(TARGET)
-AC_SUBST(DLL_TARGET)
-AC_SUBST(LIB_TARGET)
-
-
-CONFIG_STATUS=config.status
-
-
-#AC_CHECK_FUNCS([gethostbyname gettimeofday gmtime localtime getpid getppid kill gethostname ])
-
-
-AC_CYGWIN
-AM_CONDITIONAL([SYS_IS_CYGWIN], [test "$CYGWIN" = "yes"])
-if test "$CYGWIN" = "yes"; then
-  AC_DEFINE(SYS_IS_CYGWIN32, 1, are we on CYGWIN?)
-else
-  AC_DEFINE(SYS_IS_CYGWIN32, 0, are we on CYGWIN?)
-fi
-
-
-
-case "$host" in
-        *-darwin* )
-        AC_DEFINE(SYS_IS_DARWIN, 1, are we on DARWIN?)
-        ;;
-        * )
-        AC_DEFINE(SYS_IS_DARWIN, 0, are we on DARWIN?)
-        ;;
-esac
-     
-AC_CONFIG_FILES([install_cxsc])
-
-
-#AC_CONFIG_FILES([$MAKEFILE:cnf/Makefile.am])
-
-#if test "$MAKEFILE" != Makefile; then
-#   ln -sf "$MAKEFILE" Makefile
-#fi
-
-AC_OUTPUT
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ac_find_gap.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ac_find_gap.m4
deleted file mode 100755
index ed95f71..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ac_find_gap.m4
+++ /dev/null
@@ -1,163 +0,0 @@
-# Find the location of GAP
-# Sets GAPROOT, GAPARCH and GAP_CPPFLAGS appropriately
-# Can be configured using --with-gaproot=... and --with-configname=...
-#######################################################################
-
-AC_DEFUN([AC_FIND_GAP],
-[
-  AC_LANG_PUSH([C])
-  
-  # Make sure CDPATH is portably set to a sensible value
-  CDPATH=${ZSH_VERSION+.}:
-
-  GAP_CPPFLAGS=""
-
-  #Allow the user to specify a configname:
-  AC_MSG_CHECKING([for CONFIGNAME])
-  AC_ARG_VAR(CONFIGNAME, [Set this to the CONFIGNAME of the GAP compilation
-    against which you want to compile this package. Leave this
-    variable empty for GAP versions < 4.5.])
-  if test "x$CONFIGNAME" = "x"; then
-    SYSINFO="sysinfo.gap"
-    AC_MSG_RESULT([none])
-  else
-    SYSINFO="sysinfo.gap-$CONFIGNAME"
-    AC_MSG_RESULT([$CONFIGNAME])
-  fi
-
-  ######################################
-  # Find the GAP root directory by 
-  # checking for the sysinfo.gap file 
-  AC_MSG_CHECKING([for GAP root directory])
-  DEFAULT_GAPROOTS="../.."
-  
-  #Allow the user to specify the location of GAP
-  #
-  AC_ARG_WITH(gaproot, 
-    [AC_HELP_STRING([--with-gaproot=<path>], [specify root of GAP installation])],
-    [DEFAULT_GAPROOTS="$withval"])
-  
-  havesysinfo=0
-  # Otherwise try likely directories
-  for GAPROOT in ${DEFAULT_GAPROOTS} 
-  do
-    # Convert the path to absolute
-    GAPROOT=`cd $GAPROOT > /dev/null 2>&1 && pwd`
-    if test -e ${GAPROOT}/${SYSINFO}; then
-      havesysinfo=1
-      break
-    fi
-  done
-    
-  if test "x$havesysinfo" = "x1"; then
-    AC_MSG_RESULT([${GAPROOT}])
-  else
-    AC_MSG_RESULT([Not found])
-    
-    echo ""
-    echo "********************************************************************"
-    echo "  ERROR"
-    echo ""
-    echo "  Cannot find your GAP installation. Please specify the location of"
-    echo "  GAP's root directory using --with-gaproot=<path>"
-    echo ""
-    echo "  The GAP root directory (as far as this package is concerned) is"
-    echo "  the one containing the file sysinfo.gap and the subdirectories "
-    echo "  src/ and bin/."
-    echo "********************************************************************"
-    echo ""
-    
-    AC_MSG_ERROR([Unable to find GAP root directory])
-  fi
-        
-  #####################################
-  # Now find the architecture
-        
-  AC_MSG_CHECKING([for GAP architecture])
-  GAPARCH="Unknown"
-  . $GAPROOT/$SYSINFO
-  if test "x$GAParch" != "x"; then
-    GAPARCH=$GAParch
-  fi
-
-  AC_ARG_WITH(gaparch, 
-    [AC_HELP_STRING([--with-gaparch=<path>], [override GAP architecture string])],
-    [GAPARCH=$withval])
-  AC_MSG_RESULT([${GAPARCH}])
- 
-  if test "x$GAPARCH" = "xUnknown" -o ! -d $GAPROOT/bin/$GAPARCH ; then
-    echo ""
-    echo "********************************************************************"
-    echo "  ERROR"
-    echo ""
-    echo "  Found a GAP installation at $GAPROOT but could not find"
-    echo "  information about GAP's architecture in the"
-    echo "  file ${GAPROOT}/${SYSINFO} or did not find the directory"
-    echo "  ${GAPROOT}/bin/${GAPARCH}."
-    echo "  This file and directory should be present: please check your"
-    echo "  GAP installation."
-    echo "********************************************************************"
-    echo ""
-    
-    AC_MSG_ERROR([Unable to find plausible GAParch information.])
-  fi  
-  
-  
-  #####################################
-  # Now check for the GAP header files
-
-  bad=0
-  AC_MSG_CHECKING([for GAP include files])
-  if test -r $GAPROOT/src/compiled.h; then
-    AC_MSG_RESULT([$GAPROOT/src/compiled.h])
-  else
-    AC_MSG_RESULT([Not found])
-    bad=1
-  fi
-  AC_MSG_CHECKING([for GAP config.h])
-  if test -r $GAPROOT/bin/$GAPARCH/config.h; then
-    AC_MSG_RESULT([$GAPROOT/bin/$GAPARCH/config.h])
-  else
-    AC_MSG_RESULT([Not found])
-    bad=1
-  fi
-
-  if test "x$bad" = "x1"; then
-    echo ""
-    echo "********************************************************************"
-    echo "  ERROR"
-    echo ""
-    echo "  Failed to find the GAP source header files in src/ and"
-    echo "  GAP's config.h in the architecture dependend directory"
-    echo ""
-    echo "  The kernel build process expects to find the normal GAP "
-    echo "  root directory structure as it is after building GAP itself, and"
-    echo "  in particular the files"
-    echo "      <gaproot>/sysinfo.gap"
-    echo "      <gaproot>/src/<includes>"
-    echo "  and <gaproot>/bin/<architecture>/bin/config.h." 
-    echo "  Please make sure that your GAP root directory structure"
-    echo "  conforms to this layout, or give the correct GAP root using"
-    echo "  --with-gaproot=<path>"
-    echo "********************************************************************"
-    echo ""
-    AC_MSG_ERROR([Unable to find GAP include files in /src subdirectory])
-  fi
-  
-  ARCHPATH=$GAPROOT/bin/$GAPARCH
-  GAP_CPPFLAGS="-I$GAPROOT -I$ARCHPATH"
-
-  AC_MSG_CHECKING([for GAP's gmp.h location])
-  if test -r "$ARCHPATH/extern/gmp/include/gmp.h"; then
-    GAP_CPPFLAGS="$GAP_CPPFLAGS -I$ARCHPATH/extern/gmp/include"
-    AC_MSG_RESULT([$ARCHPATH/extern/gmp/include/gmp.h])
-  else
-    AC_MSG_RESULT([not found, GAP was compiled without GMP])
-  fi;
- 
-  AC_SUBST(GAPARCH)
-  AC_SUBST(GAPROOT)
-  AC_SUBST(GAP_CPPFLAGS)
-
-  AC_LANG_POP([C])
-])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ax_cc_maxopt.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ax_cc_maxopt.m4
deleted file mode 100755
index c59143d..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ax_cc_maxopt.m4
+++ /dev/null
@@ -1,184 +0,0 @@
-##### http://autoconf-archive.cryp.to/ax_cc_maxopt.html
-#
-# SYNOPSIS
-#
-#   AX_CC_MAXOPT
-#
-# DESCRIPTION
-#
-#   Try to turn on "good" C optimization flags for various compilers
-#   and architectures, for some definition of "good". (In our case,
-#   good for FFTW and hopefully for other scientific codes. Modify as
-#   needed.)
-#
-#   The user can override the flags by setting the CFLAGS environment
-#   variable. The user can also specify --enable-portable-binary in
-#   order to disable any optimization flags that might result in a
-#   binary that only runs on the host architecture.
-#
-#   Note also that the flags assume that ANSI C aliasing rules are
-#   followed by the code (e.g. for gcc's -fstrict-aliasing), and that
-#   floating-point computations can be re-ordered as needed.
-#
-#   Requires macros: AX_CHECK_COMPILER_FLAGS, AX_COMPILER_VENDOR,
-#   AX_GCC_ARCHFLAG, AX_GCC_X86_CPUID.
-#
-# LAST MODIFICATION
-#
-#   2007-07-29
-#
-# COPYLEFT
-#
-#   Copyright (c) 2007 Steven G. Johnson <stevenj@alum.mit.edu>
-#   Copyright (c) 2007 Matteo Frigo
-#
-#   This program is free software: you can redistribute it and/or
-#   modify it under the terms of the GNU General Public License as
-#   published by the Free Software Foundation, either version 3 of the
-#   License, or (at your option) any later version.
-#
-#   This program is distributed in the hope that it will be useful, but
-#   WITHOUT ANY WARRANTY; without even the implied warranty of
-#   MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
-#   General Public License for more details.
-#
-#   You should have received a copy of the GNU General Public License
-#   along with this program. If not, see
-#   <http://www.gnu.org/licenses/>.
-#
-#   As a special exception, the respective Autoconf Macro's copyright
-#   owner gives unlimited permission to copy, distribute and modify the
-#   configure scripts that are the output of Autoconf when processing
-#   the Macro. You need not follow the terms of the GNU General Public
-#   License when using or distributing such scripts, even though
-#   portions of the text of the Macro appear in them. The GNU General
-#   Public License (GPL) does govern all other use of the material that
-#   constitutes the Autoconf Macro.
-#
-#   This special exception to the GPL applies to versions of the
-#   Autoconf Macro released by the Autoconf Macro Archive. When you
-#   make and distribute a modified version of the Autoconf Macro, you
-#   may extend this special exception to the GPL to apply to your
-#   modified version as well.
-
-AC_DEFUN([AX_CC_MAXOPT],
-[
-AC_REQUIRE([AC_PROG_CC])
-AC_REQUIRE([AX_COMPILER_VENDOR])
-AC_REQUIRE([AC_CANONICAL_HOST])
-
-AC_ARG_ENABLE(portable-binary, [AC_HELP_STRING([--enable-portable-binary], [disable compiler optimizations that would produce unportable binaries])],
-	acx_maxopt_portable=$withval, acx_maxopt_portable=no)
-
-# Try to determine "good" native compiler flags if none specified via CFLAGS
-if test "$ac_test_CFLAGS" != "set"; then
-  CFLAGS=""
-  case $ax_cv_c_compiler_vendor in
-    dec) CFLAGS="-newc -w0 -O5 -ansi_alias -ansi_args -fp_reorder -tune host"
-	 if test "x$acx_maxopt_portable" = xno; then
-           CFLAGS="$CFLAGS -arch host"
-         fi;;
-
-    sun) CFLAGS="-native -fast -xO5 -dalign"
-	 if test "x$acx_maxopt_portable" = xyes; then
-	   CFLAGS="$CFLAGS -xarch=generic"
-         fi;;
-
-    hp)  CFLAGS="+Oall +Optrs_ansi +DSnative"
-	 if test "x$acx_maxopt_portable" = xyes; then
-	   CFLAGS="$CFLAGS +DAportable"
-	 fi;;
-
-    ibm) if test "x$acx_maxopt_portable" = xno; then
-           xlc_opt="-qarch=auto -qtune=auto"
-	 else
-           xlc_opt="-qtune=auto"
-	 fi
-         AX_CHECK_COMPILER_FLAGS($xlc_opt,
-         	CFLAGS="-O3 -qansialias -w $xlc_opt",
-               [CFLAGS="-O3 -qansialias -w"
-                echo "******************************************************"
-                echo "*  You seem to have the IBM  C compiler.  It is      *"
-                echo "*  recommended for best performance that you use:    *"
-                echo "*                                                    *"
-                echo "*    CFLAGS=-O3 -qarch=xxx -qtune=xxx -qansialias -w *"
-                echo "*                      ^^^        ^^^                *"
-                echo "*  where xxx is pwr2, pwr3, 604, or whatever kind of *"
-                echo "*  CPU you have.  (Set the CFLAGS environment var.   *"
-                echo "*  and re-run configure.)  For more info, man cc.    *"
-                echo "******************************************************"])
-         ;;
-
-    intel) CFLAGS="-O3 -ansi_alias"
-	if test "x$acx_maxopt_portable" = xno; then
-	  icc_archflag=unknown
-	  icc_flags=""
-	  case $host_cpu in
-	    i686*|x86_64*)
-              # icc accepts gcc assembly syntax, so these should work:
-	      AX_GCC_X86_CPUID(0)
-              AX_GCC_X86_CPUID(1)
-	      case $ax_cv_gcc_x86_cpuid_0 in # see AX_GCC_ARCHFLAG
-                *:756e6547:*:*) # Intel
-                  case $ax_cv_gcc_x86_cpuid_1 in
-                    *6a?:*[[234]]:*:*|*6[[789b]]?:*:*:*) icc_flags="-xK";;
-                    *f3[[347]]:*:*:*|*f4[1347]:*:*:*) icc_flags="-xP -xN -xW -xK";;
-                    *f??:*:*:*) icc_flags="-xN -xW -xK";;
-                  esac ;;
-              esac ;;
-          esac
-          if test "x$icc_flags" != x; then
-            for flag in $icc_flags; do
-              AX_CHECK_COMPILER_FLAGS($flag, [icc_archflag=$flag; break])
-            done
-          fi
-          AC_MSG_CHECKING([for icc architecture flag])
-	  AC_MSG_RESULT($icc_archflag)
-          if test "x$icc_archflag" != xunknown; then
-            CFLAGS="$CFLAGS $icc_archflag"
-          fi
-        fi
-	;;
-
-    gnu)
-     # default optimization flags for gcc on all systems
-     CFLAGS="-O3 -fomit-frame-pointer"
-
-     # -malign-double for x86 systems
-     AX_CHECK_COMPILER_FLAGS(-malign-double, CFLAGS="$CFLAGS -malign-double")
-
-     #  -fstrict-aliasing for gcc-2.95+
-     AX_CHECK_COMPILER_FLAGS(-fstrict-aliasing,
-	CFLAGS="$CFLAGS -fstrict-aliasing")
-
-     # note that we enable "unsafe" fp optimization with other compilers, too
-     AX_CHECK_COMPILER_FLAGS(-ffast-math, CFLAGS="$CFLAGS -ffast-math")
-
-     AX_GCC_ARCHFLAG($acx_maxopt_portable)
-     ;;
-  esac
-
-  if test -z "$CFLAGS"; then
-	echo ""
-	echo "********************************************************"
-        echo "* WARNING: Don't know the best CFLAGS for this system  *"
-        echo "* Use ./configure CFLAGS=... to specify your own flags *"
-	echo "* (otherwise, a default of CFLAGS=-O3 will be used)    *"
-	echo "********************************************************"
-	echo ""
-        CFLAGS="-O3"
-  fi
-
-  AX_CHECK_COMPILER_FLAGS($CFLAGS, [], [
-	echo ""
-        echo "********************************************************"
-        echo "* WARNING: The guessed CFLAGS don't seem to work with  *"
-        echo "* your compiler.                                       *"
-        echo "* Use ./configure CFLAGS=... to specify your own flags *"
-        echo "********************************************************"
-        echo ""
-        CFLAGS=""
-  ])
-
-fi
-])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ax_check_compiler_flags.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ax_check_compiler_flags.m4
deleted file mode 100755
index 809cfde..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ax_check_compiler_flags.m4
+++ /dev/null
@@ -1,79 +0,0 @@
-##### http://autoconf-archive.cryp.to/ax_check_compiler_flags.html
-#
-# SYNOPSIS
-#
-#   AX_CHECK_COMPILER_FLAGS(FLAGS, [ACTION-SUCCESS], [ACTION-FAILURE])
-#
-# DESCRIPTION
-#
-#   Check whether the given compiler FLAGS work with the current
-#   language's compiler, or whether they give an error. (Warnings,
-#   however, are ignored.)
-#
-#   ACTION-SUCCESS/ACTION-FAILURE are shell commands to execute on
-#   success/failure.
-#
-# LAST MODIFICATION
-#
-#   2007-07-29
-#
-# COPYLEFT
-#
-#   Copyright (c) 2007 Steven G. Johnson <stevenj@alum.mit.edu>
-#   Copyright (c) 2007 Matteo Frigo
-#
-#   This program is free software: you can redistribute it and/or
-#   modify it under the terms of the GNU General Public License as
-#   published by the Free Software Foundation, either version 3 of the
-#   License, or (at your option) any later version.
-#
-#   This program is distributed in the hope that it will be useful, but
-#   WITHOUT ANY WARRANTY; without even the implied warranty of
-#   MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
-#   General Public License for more details.
-#
-#   You should have received a copy of the GNU General Public License
-#   along with this program. If not, see
-#   <http://www.gnu.org/licenses/>.
-#
-#   As a special exception, the respective Autoconf Macro's copyright
-#   owner gives unlimited permission to copy, distribute and modify the
-#   configure scripts that are the output of Autoconf when processing
-#   the Macro. You need not follow the terms of the GNU General Public
-#   License when using or distributing such scripts, even though
-#   portions of the text of the Macro appear in them. The GNU General
-#   Public License (GPL) does govern all other use of the material that
-#   constitutes the Autoconf Macro.
-#
-#   This special exception to the GPL applies to versions of the
-#   Autoconf Macro released by the Autoconf Macro Archive. When you
-#   make and distribute a modified version of the Autoconf Macro, you
-#   may extend this special exception to the GPL to apply to your
-#   modified version as well.
-
-AC_DEFUN([AX_CHECK_COMPILER_FLAGS],
-[AC_PREREQ(2.59) dnl for _AC_LANG_PREFIX
-AC_MSG_CHECKING([whether _AC_LANG compiler accepts $1])
-dnl Some hackery here since AC_CACHE_VAL can't handle a non-literal varname:
-AS_LITERAL_IF([$1],
-  [AC_CACHE_VAL(AS_TR_SH(ax_cv_[]_AC_LANG_ABBREV[]_flags_$1), [
-      ax_save_FLAGS=$[]_AC_LANG_PREFIX[]FLAGS
-      _AC_LANG_PREFIX[]FLAGS="$1"
-      AC_COMPILE_IFELSE([AC_LANG_PROGRAM()],
-        AS_TR_SH(ax_cv_[]_AC_LANG_ABBREV[]_flags_$1)=yes,
-        AS_TR_SH(ax_cv_[]_AC_LANG_ABBREV[]_flags_$1)=no)
-      _AC_LANG_PREFIX[]FLAGS=$ax_save_FLAGS])],
-  [ax_save_FLAGS=$[]_AC_LANG_PREFIX[]FLAGS
-   _AC_LANG_PREFIX[]FLAGS="$1"
-   AC_COMPILE_IFELSE([AC_LANG_PROGRAM()],
-     eval AS_TR_SH(ax_cv_[]_AC_LANG_ABBREV[]_flags_$1)=yes,
-     eval AS_TR_SH(ax_cv_[]_AC_LANG_ABBREV[]_flags_$1)=no)
-   _AC_LANG_PREFIX[]FLAGS=$ax_save_FLAGS])
-eval ax_check_compiler_flags=$AS_TR_SH(ax_cv_[]_AC_LANG_ABBREV[]_flags_$1)
-AC_MSG_RESULT($ax_check_compiler_flags)
-if test "x$ax_check_compiler_flags" = xyes; then
-	m4_default([$2], :)
-else
-	m4_default([$3], :)
-fi
-])dnl AX_CHECK_COMPILER_FLAGS
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ax_compiler_vendor.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ax_compiler_vendor.m4
deleted file mode 100755
index f4228aa..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ax_compiler_vendor.m4
+++ /dev/null
@@ -1,67 +0,0 @@
-##### http://autoconf-archive.cryp.to/ax_compiler_vendor.html
-#
-# SYNOPSIS
-#
-#   AX_COMPILER_VENDOR
-#
-# DESCRIPTION
-#
-#   Determine the vendor of the C/C++ compiler, e.g., gnu, intel, ibm,
-#   sun, hp, borland, comeau, dec, cray, kai, lcc, metrowerks, sgi,
-#   microsoft, watcom, etc. The vendor is returned in the cache
-#   variable $ax_cv_c_compiler_vendor for C and
-#   $ax_cv_cxx_compiler_vendor for C++.
-#
-# LAST MODIFICATION
-#
-#   2007-08-01
-#
-# COPYLEFT
-#
-#   Copyright (c) 2007 Steven G. Johnson <stevenj@alum.mit.edu>
-#   Copyright (c) 2007 Matteo Frigo
-#
-#   This program is free software: you can redistribute it and/or
-#   modify it under the terms of the GNU General Public License as
-#   published by the Free Software Foundation, either version 3 of the
-#   License, or (at your option) any later version.
-#
-#   This program is distributed in the hope that it will be useful, but
-#   WITHOUT ANY WARRANTY; without even the implied warranty of
-#   MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
-#   General Public License for more details.
-#
-#   You should have received a copy of the GNU General Public License
-#   along with this program. If not, see
-#   <http://www.gnu.org/licenses/>.
-#
-#   As a special exception, the respective Autoconf Macro's copyright
-#   owner gives unlimited permission to copy, distribute and modify the
-#   configure scripts that are the output of Autoconf when processing
-#   the Macro. You need not follow the terms of the GNU General Public
-#   License when using or distributing such scripts, even though
-#   portions of the text of the Macro appear in them. The GNU General
-#   Public License (GPL) does govern all other use of the material that
-#   constitutes the Autoconf Macro.
-#
-#   This special exception to the GPL applies to versions of the
-#   Autoconf Macro released by the Autoconf Macro Archive. When you
-#   make and distribute a modified version of the Autoconf Macro, you
-#   may extend this special exception to the GPL to apply to your
-#   modified version as well.
-
-AC_DEFUN([AX_COMPILER_VENDOR],
-[
-AC_CACHE_CHECK([for _AC_LANG compiler vendor], ax_cv_[]_AC_LANG_ABBREV[]_compiler_vendor,
- [ax_cv_[]_AC_LANG_ABBREV[]_compiler_vendor=unknown
-  # note: don't check for gcc first since some other compilers define __GNUC__
-  for ventest in intel:__ICC,__ECC,__INTEL_COMPILER ibm:__xlc__,__xlC__,__IBMC__,__IBMCPP__ pathscale:__PATHCC__,__PATHSCALE__ gnu:__GNUC__ sun:__SUNPRO_C,__SUNPRO_CC hp:__HP_cc,__HP_aCC dec:__DECC,__DECCXX,__DECC_VER,__DECCXX_VER borland:__BORLANDC__,__TURBOC__ comeau:__COMO__ cray:_CRAYC kai:__KCC lcc:__LCC__ metrowerks:__MWERKS__ sgi:__sgi,sgi microsoft:_MSC_VER watcom:__WATCOMC__ portland:__PGI; do
-    vencpp="defined("`echo $ventest | cut -d: -f2 | sed 's/,/) || defined(/g'`")"
-    AC_COMPILE_IFELSE([AC_LANG_PROGRAM(,[
-#if !($vencpp)
-      thisisanerror;
-#endif
-])], [ax_cv_]_AC_LANG_ABBREV[_compiler_vendor=`echo $ventest | cut -d: -f1`; break])
-  done
- ])
-])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ax_gcc_archflag.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ax_gcc_archflag.m4
deleted file mode 100755
index 34663d6..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ax_gcc_archflag.m4
+++ /dev/null
@@ -1,221 +0,0 @@
-##### http://autoconf-archive.cryp.to/ax_gcc_archflag.html
-#
-# SYNOPSIS
-#
-#   AX_GCC_ARCHFLAG([PORTABLE?], [ACTION-SUCCESS], [ACTION-FAILURE])
-#
-# DESCRIPTION
-#
-#   This macro tries to guess the "native" arch corresponding to the
-#   target architecture for use with gcc's -march=arch or -mtune=arch
-#   flags. If found, the cache variable $ax_cv_gcc_archflag is set to
-#   this flag and ACTION-SUCCESS is executed; otherwise
-#   $ax_cv_gcc_archflag is is set to "unknown" and ACTION-FAILURE is
-#   executed. The default ACTION-SUCCESS is to add $ax_cv_gcc_archflag
-#   to the end of $CFLAGS.
-#
-#   PORTABLE? should be either [yes] (default) or [no]. In the former
-#   case, the flag is set to -mtune (or equivalent) so that the
-#   architecture is only used for tuning, but the instruction set used
-#   is still portable. In the latter case, the flag is set to -march
-#   (or equivalent) so that architecture-specific instructions are
-#   enabled.
-#
-#   The user can specify --with-gcc-arch=<arch> in order to override
-#   the macro's choice of architecture, or --without-gcc-arch to
-#   disable this.
-#
-#   When cross-compiling, or if $CC is not gcc, then ACTION-FAILURE is
-#   called unless the user specified --with-gcc-arch manually.
-#
-#   Requires macros: AX_CHECK_COMPILER_FLAGS, AX_GCC_X86_CPUID
-#
-#   (The main emphasis here is on recent CPUs, on the principle that
-#   doing high-performance computing on old hardware is uncommon.)
-#
-# LAST MODIFICATION
-#
-#   2007-07-29
-#
-# COPYLEFT
-#
-#   Copyright (c) 2007 Steven G. Johnson <stevenj@alum.mit.edu>
-#   Copyright (c) 2007 Matteo Frigo
-#
-#   This program is free software: you can redistribute it and/or
-#   modify it under the terms of the GNU General Public License as
-#   published by the Free Software Foundation, either version 3 of the
-#   License, or (at your option) any later version.
-#
-#   This program is distributed in the hope that it will be useful, but
-#   WITHOUT ANY WARRANTY; without even the implied warranty of
-#   MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
-#   General Public License for more details.
-#
-#   You should have received a copy of the GNU General Public License
-#   along with this program. If not, see
-#   <http://www.gnu.org/licenses/>.
-#
-#   As a special exception, the respective Autoconf Macro's copyright
-#   owner gives unlimited permission to copy, distribute and modify the
-#   configure scripts that are the output of Autoconf when processing
-#   the Macro. You need not follow the terms of the GNU General Public
-#   License when using or distributing such scripts, even though
-#   portions of the text of the Macro appear in them. The GNU General
-#   Public License (GPL) does govern all other use of the material that
-#   constitutes the Autoconf Macro.
-#
-#   This special exception to the GPL applies to versions of the
-#   Autoconf Macro released by the Autoconf Macro Archive. When you
-#   make and distribute a modified version of the Autoconf Macro, you
-#   may extend this special exception to the GPL to apply to your
-#   modified version as well.
-
-AC_DEFUN([AX_GCC_ARCHFLAG],
-[AC_REQUIRE([AC_PROG_CC])
-AC_REQUIRE([AC_CANONICAL_HOST])
-
-AC_ARG_WITH(gcc-arch, [AC_HELP_STRING([--with-gcc-arch=<arch>], [use architecture <arch> for gcc -march/-mtune, instead of guessing])],
-	ax_gcc_arch=$withval, ax_gcc_arch=yes)
-
-AC_MSG_CHECKING([for gcc architecture flag])
-AC_MSG_RESULT([])
-AC_CACHE_VAL(ax_cv_gcc_archflag,
-[
-ax_cv_gcc_archflag="unknown"
-
-if test "$GCC" = yes; then
-
-if test "x$ax_gcc_arch" = xyes; then
-ax_gcc_arch=""
-if test "$cross_compiling" = no; then
-case $host_cpu in
-  i[[3456]]86*|x86_64*) # use cpuid codes, in part from x86info-1.7 by D. Jones
-     AX_GCC_X86_CPUID(0)
-     AX_GCC_X86_CPUID(1)
-     case $ax_cv_gcc_x86_cpuid_0 in
-       *:756e6547:*:*) # Intel
-          case $ax_cv_gcc_x86_cpuid_1 in
-	    *5[[48]]?:*:*:*) ax_gcc_arch="pentium-mmx pentium" ;;
-	    *5??:*:*:*) ax_gcc_arch=pentium ;;
-	    *6[[3456]]?:*:*:*) ax_gcc_arch="pentium2 pentiumpro" ;;
-	    *6a?:*[[01]]:*:*) ax_gcc_arch="pentium2 pentiumpro" ;;
-	    *6a?:*[[234]]:*:*) ax_gcc_arch="pentium3 pentiumpro" ;;
-	    *6[[9d]]?:*:*:*) ax_gcc_arch="pentium-m pentium3 pentiumpro" ;;
-	    *6[[78b]]?:*:*:*) ax_gcc_arch="pentium3 pentiumpro" ;;
-	    *6??:*:*:*) ax_gcc_arch=pentiumpro ;;
-            *f3[[347]]:*:*:*|*f4[1347]:*:*:*)
-		case $host_cpu in
-                  x86_64*) ax_gcc_arch="nocona pentium4 pentiumpro" ;;
-                  *) ax_gcc_arch="prescott pentium4 pentiumpro" ;;
-                esac ;;
-            *f??:*:*:*) ax_gcc_arch="pentium4 pentiumpro";;
-          esac ;;
-       *:68747541:*:*) # AMD
-          case $ax_cv_gcc_x86_cpuid_1 in
-	    *5[[67]]?:*:*:*) ax_gcc_arch=k6 ;;
-	    *5[[8d]]?:*:*:*) ax_gcc_arch="k6-2 k6" ;;
-	    *5[[9]]?:*:*:*) ax_gcc_arch="k6-3 k6" ;;
-	    *60?:*:*:*) ax_gcc_arch=k7 ;;
-	    *6[[12]]?:*:*:*) ax_gcc_arch="athlon k7" ;;
-	    *6[[34]]?:*:*:*) ax_gcc_arch="athlon-tbird k7" ;;
-	    *67?:*:*:*) ax_gcc_arch="athlon-4 athlon k7" ;;
-	    *6[[68a]]?:*:*:*)
-	       AX_GCC_X86_CPUID(0x80000006) # L2 cache size
-	       case $ax_cv_gcc_x86_cpuid_0x80000006 in
-                 *:*:*[[1-9a-f]]??????:*) # (L2 = ecx >> 16) >= 256
-			ax_gcc_arch="athlon-xp athlon-4 athlon k7" ;;
-                 *) ax_gcc_arch="athlon-4 athlon k7" ;;
-	       esac ;;
-	    *f[[4cef8b]]?:*:*:*) ax_gcc_arch="athlon64 k8" ;;
-	    *f5?:*:*:*) ax_gcc_arch="opteron k8" ;;
-	    *f7?:*:*:*) ax_gcc_arch="athlon-fx opteron k8" ;;
-	    *f??:*:*:*) ax_gcc_arch="k8" ;;
-          esac ;;
-	*:746e6543:*:*) # IDT
-	   case $ax_cv_gcc_x86_cpuid_1 in
-	     *54?:*:*:*) ax_gcc_arch=winchip-c6 ;;
-	     *58?:*:*:*) ax_gcc_arch=winchip2 ;;
-	     *6[[78]]?:*:*:*) ax_gcc_arch=c3 ;;
-	     *69?:*:*:*) ax_gcc_arch="c3-2 c3" ;;
-	   esac ;;
-     esac
-     if test x"$ax_gcc_arch" = x; then # fallback
-	case $host_cpu in
-	  i586*) ax_gcc_arch=pentium ;;
-	  i686*) ax_gcc_arch=pentiumpro ;;
-        esac
-     fi
-     ;;
-
-  sparc*)
-     AC_PATH_PROG([PRTDIAG], [prtdiag], [prtdiag], [$PATH:/usr/platform/`uname -i`/sbin/:/usr/platform/`uname -m`/sbin/])
-     cputype=`(((grep cpu /proc/cpuinfo | cut -d: -f2) ; ($PRTDIAG -v |grep -i sparc) ; grep -i cpu /var/run/dmesg.boot ) | head -n 1) 2> /dev/null`
-     cputype=`echo "$cputype" | tr -d ' -' |tr $as_cr_LETTERS $as_cr_letters`
-     case $cputype in
-         *ultrasparciv*) ax_gcc_arch="ultrasparc4 ultrasparc3 ultrasparc v9" ;;
-         *ultrasparciii*) ax_gcc_arch="ultrasparc3 ultrasparc v9" ;;
-         *ultrasparc*) ax_gcc_arch="ultrasparc v9" ;;
-         *supersparc*|*tms390z5[[05]]*) ax_gcc_arch="supersparc v8" ;;
-         *hypersparc*|*rt62[[056]]*) ax_gcc_arch="hypersparc v8" ;;
-         *cypress*) ax_gcc_arch=cypress ;;
-     esac ;;
-
-  alphaev5) ax_gcc_arch=ev5 ;;
-  alphaev56) ax_gcc_arch=ev56 ;;
-  alphapca56) ax_gcc_arch="pca56 ev56" ;;
-  alphapca57) ax_gcc_arch="pca57 pca56 ev56" ;;
-  alphaev6) ax_gcc_arch=ev6 ;;
-  alphaev67) ax_gcc_arch=ev67 ;;
-  alphaev68) ax_gcc_arch="ev68 ev67" ;;
-  alphaev69) ax_gcc_arch="ev69 ev68 ev67" ;;
-  alphaev7) ax_gcc_arch="ev7 ev69 ev68 ev67" ;;
-  alphaev79) ax_gcc_arch="ev79 ev7 ev69 ev68 ev67" ;;
-
-  powerpc*)
-     cputype=`((grep cpu /proc/cpuinfo | head -n 1 | cut -d: -f2 | cut -d, -f1 | sed 's/ //g') ; /usr/bin/machine ; /bin/machine; grep CPU /var/run/dmesg.boot | head -n 1 | cut -d" " -f2) 2> /dev/null`
-     cputype=`echo $cputype | sed -e 's/ppc//g;s/ *//g'`
-     case $cputype in
-       *750*) ax_gcc_arch="750 G3" ;;
-       *740[[0-9]]*) ax_gcc_arch="$cputype 7400 G4" ;;
-       *74[[4-5]][[0-9]]*) ax_gcc_arch="$cputype 7450 G4" ;;
-       *74[[0-9]][[0-9]]*) ax_gcc_arch="$cputype G4" ;;
-       *970*) ax_gcc_arch="970 G5 power4";;
-       *POWER4*|*power4*|*gq*) ax_gcc_arch="power4 970";;
-       *POWER5*|*power5*|*gr*|*gs*) ax_gcc_arch="power5 power4 970";;
-       603ev|8240) ax_gcc_arch="$cputype 603e 603";;
-       *) ax_gcc_arch=$cputype ;;
-     esac
-     ax_gcc_arch="$ax_gcc_arch powerpc"
-     ;;
-esac
-fi # not cross-compiling
-fi # guess arch
-
-if test "x$ax_gcc_arch" != x -a "x$ax_gcc_arch" != xno; then
-for arch in $ax_gcc_arch; do
-  if test "x[]m4_default([$1],yes)" = xyes; then # if we require portable code
-    flags="-mtune=$arch"
-    # -mcpu=$arch and m$arch generate nonportable code on every arch except
-    # x86.  And some other arches (e.g. Alpha) don't accept -mtune.  Grrr.
-    case $host_cpu in i*86|x86_64*) flags="$flags -mcpu=$arch -m$arch";; esac
-  else
-    flags="-march=$arch -mcpu=$arch -m$arch"
-  fi
-  for flag in $flags; do
-    AX_CHECK_COMPILER_FLAGS($flag, [ax_cv_gcc_archflag=$flag; break])
-  done
-  test "x$ax_cv_gcc_archflag" = xunknown || break
-done
-fi
-
-fi # $GCC=yes
-])
-AC_MSG_CHECKING([for gcc architecture flag])
-AC_MSG_RESULT($ax_cv_gcc_archflag)
-if test "x$ax_cv_gcc_archflag" = xunknown; then
-  m4_default([$3],:)
-else
-  m4_default([$2], [CFLAGS="$CFLAGS $ax_cv_gcc_archflag"])
-fi
-])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ax_gcc_x86_cpuid.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ax_gcc_x86_cpuid.m4
deleted file mode 100755
index e05d58b..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ax_gcc_x86_cpuid.m4
+++ /dev/null
@@ -1,82 +0,0 @@
-##### http://autoconf-archive.cryp.to/ax_gcc_x86_cpuid.html
-#
-# SYNOPSIS
-#
-#   AX_GCC_X86_CPUID(OP)
-#
-# DESCRIPTION
-#
-#   On Pentium and later x86 processors, with gcc or a compiler that
-#   has a compatible syntax for inline assembly instructions, run a
-#   small program that executes the cpuid instruction with input OP.
-#   This can be used to detect the CPU type.
-#
-#   On output, the values of the eax, ebx, ecx, and edx registers are
-#   stored as hexadecimal strings as "eax:ebx:ecx:edx" in the cache
-#   variable ax_cv_gcc_x86_cpuid_OP.
-#
-#   If the cpuid instruction fails (because you are running a
-#   cross-compiler, or because you are not using gcc, or because you
-#   are on a processor that doesn't have this instruction),
-#   ax_cv_gcc_x86_cpuid_OP is set to the string "unknown".
-#
-#   This macro mainly exists to be used in AX_GCC_ARCHFLAG.
-#
-# LAST MODIFICATION
-#
-#   2007-07-29
-#
-# COPYLEFT
-#
-#   Copyright (c) 2007 Steven G. Johnson <stevenj@alum.mit.edu>
-#   Copyright (c) 2007 Matteo Frigo
-#
-#   This program is free software: you can redistribute it and/or
-#   modify it under the terms of the GNU General Public License as
-#   published by the Free Software Foundation, either version 3 of the
-#   License, or (at your option) any later version.
-#
-#   This program is distributed in the hope that it will be useful, but
-#   WITHOUT ANY WARRANTY; without even the implied warranty of
-#   MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
-#   General Public License for more details.
-#
-#   You should have received a copy of the GNU General Public License
-#   along with this program. If not, see
-#   <http://www.gnu.org/licenses/>.
-#
-#   As a special exception, the respective Autoconf Macro's copyright
-#   owner gives unlimited permission to copy, distribute and modify the
-#   configure scripts that are the output of Autoconf when processing
-#   the Macro. You need not follow the terms of the GNU General Public
-#   License when using or distributing such scripts, even though
-#   portions of the text of the Macro appear in them. The GNU General
-#   Public License (GPL) does govern all other use of the material that
-#   constitutes the Autoconf Macro.
-#
-#   This special exception to the GPL applies to versions of the
-#   Autoconf Macro released by the Autoconf Macro Archive. When you
-#   make and distribute a modified version of the Autoconf Macro, you
-#   may extend this special exception to the GPL to apply to your
-#   modified version as well.
-
-AC_DEFUN([AX_GCC_X86_CPUID],
-[AC_REQUIRE([AC_PROG_CC])
-AC_LANG_PUSH([C])
-AC_CACHE_CHECK(for x86 cpuid $1 output, ax_cv_gcc_x86_cpuid_$1,
- [AC_RUN_IFELSE([AC_LANG_PROGRAM([#include <stdio.h>], [
-     int op = $1, eax, ebx, ecx, edx;
-     FILE *f;
-      __asm__("cpuid"
-        : "=a" (eax), "=b" (ebx), "=c" (ecx), "=d" (edx)
-        : "a" (op));
-     f = fopen("conftest_cpuid", "w"); if (!f) return 1;
-     fprintf(f, "%x:%x:%x:%x\n", eax, ebx, ecx, edx);
-     fclose(f);
-     return 0;
-])],
-     [ax_cv_gcc_x86_cpuid_$1=`cat conftest_cpuid`; rm -f conftest_cpuid],
-     [ax_cv_gcc_x86_cpuid_$1=unknown; rm -f conftest_cpuid],
-     [ax_cv_gcc_x86_cpuid_$1=unknown])])
-AC_LANG_POP([C])
-])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/libtool.m4 b/sandbox/hurwitz.kroeker/src/float/m4/libtool.m4
deleted file mode 100644
index 44e0ecf..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/libtool.m4
+++ /dev/null
@@ -1,7982 +0,0 @@
-# libtool.m4 - Configure libtool for the host system. -*-Autoconf-*-
-#
-#   Copyright (C) 1996, 1997, 1998, 1999, 2000, 2001, 2003, 2004, 2005,
-#                 2006, 2007, 2008, 2009, 2010, 2011 Free Software
-#                 Foundation, Inc.
-#   Written by Gordon Matzigkeit, 1996
-#
-# This file is free software; the Free Software Foundation gives
-# unlimited permission to copy and/or distribute it, with or without
-# modifications, as long as this notice is preserved.
-
-m4_define([_LT_COPYING], [dnl
-#   Copyright (C) 1996, 1997, 1998, 1999, 2000, 2001, 2003, 2004, 2005,
-#                 2006, 2007, 2008, 2009, 2010, 2011 Free Software
-#                 Foundation, Inc.
-#   Written by Gordon Matzigkeit, 1996
-#
-#   This file is part of GNU Libtool.
-#
-# GNU Libtool is free software; you can redistribute it and/or
-# modify it under the terms of the GNU General Public License as
-# published by the Free Software Foundation; either version 2 of
-# the License, or (at your option) any later version.
-#
-# As a special exception to the GNU General Public License,
-# if you distribute this file as part of a program or library that
-# is built using GNU Libtool, you may include this file under the
-# same distribution terms that you use for the rest of that program.
-#
-# GNU Libtool is distributed in the hope that it will be useful,
-# but WITHOUT ANY WARRANTY; without even the implied warranty of
-# MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the
-# GNU General Public License for more details.
-#
-# You should have received a copy of the GNU General Public License
-# along with GNU Libtool; see the file COPYING.  If not, a copy
-# can be downloaded from http://www.gnu.org/licenses/gpl.html, or
-# obtained by writing to the Free Software Foundation, Inc.,
-# 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301, USA.
-])
-
-# serial 57 LT_INIT
-
-
-# LT_PREREQ(VERSION)
-# ------------------
-# Complain and exit if this libtool version is less that VERSION.
-m4_defun([LT_PREREQ],
-[m4_if(m4_version_compare(m4_defn([LT_PACKAGE_VERSION]), [$1]), -1,
-       [m4_default([$3],
-		   [m4_fatal([Libtool version $1 or higher is required],
-		             63)])],
-       [$2])])
-
-
-# _LT_CHECK_BUILDDIR
-# ------------------
-# Complain if the absolute build directory name contains unusual characters
-m4_defun([_LT_CHECK_BUILDDIR],
-[case `pwd` in
-  *\ * | *\	*)
-    AC_MSG_WARN([Libtool does not cope well with whitespace in `pwd`]) ;;
-esac
-])
-
-
-# LT_INIT([OPTIONS])
-# ------------------
-AC_DEFUN([LT_INIT],
-[AC_PREREQ([2.58])dnl We use AC_INCLUDES_DEFAULT
-AC_REQUIRE([AC_CONFIG_AUX_DIR_DEFAULT])dnl
-AC_BEFORE([$0], [LT_LANG])dnl
-AC_BEFORE([$0], [LT_OUTPUT])dnl
-AC_BEFORE([$0], [LTDL_INIT])dnl
-m4_require([_LT_CHECK_BUILDDIR])dnl
-
-dnl Autoconf doesn't catch unexpanded LT_ macros by default:
-m4_pattern_forbid([^_?LT_[A-Z_]+$])dnl
-m4_pattern_allow([^(_LT_EOF|LT_DLGLOBAL|LT_DLLAZY_OR_NOW|LT_MULTI_MODULE)$])dnl
-dnl aclocal doesn't pull ltoptions.m4, ltsugar.m4, or ltversion.m4
-dnl unless we require an AC_DEFUNed macro:
-AC_REQUIRE([LTOPTIONS_VERSION])dnl
-AC_REQUIRE([LTSUGAR_VERSION])dnl
-AC_REQUIRE([LTVERSION_VERSION])dnl
-AC_REQUIRE([LTOBSOLETE_VERSION])dnl
-m4_require([_LT_PROG_LTMAIN])dnl
-
-_LT_SHELL_INIT([SHELL=${CONFIG_SHELL-/bin/sh}])
-
-dnl Parse OPTIONS
-_LT_SET_OPTIONS([$0], [$1])
-
-# This can be used to rebuild libtool when needed
-LIBTOOL_DEPS="$ltmain"
-
-# Always use our own libtool.
-LIBTOOL='$(SHELL) $(top_builddir)/libtool'
-AC_SUBST(LIBTOOL)dnl
-
-_LT_SETUP
-
-# Only expand once:
-m4_define([LT_INIT])
-])# LT_INIT
-
-# Old names:
-AU_ALIAS([AC_PROG_LIBTOOL], [LT_INIT])
-AU_ALIAS([AM_PROG_LIBTOOL], [LT_INIT])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_PROG_LIBTOOL], [])
-dnl AC_DEFUN([AM_PROG_LIBTOOL], [])
-
-
-# _LT_CC_BASENAME(CC)
-# -------------------
-# Calculate cc_basename.  Skip known compiler wrappers and cross-prefix.
-m4_defun([_LT_CC_BASENAME],
-[for cc_temp in $1""; do
-  case $cc_temp in
-    compile | *[[\\/]]compile | ccache | *[[\\/]]ccache ) ;;
-    distcc | *[[\\/]]distcc | purify | *[[\\/]]purify ) ;;
-    \-*) ;;
-    *) break;;
-  esac
-done
-cc_basename=`$ECHO "$cc_temp" | $SED "s%.*/%%; s%^$host_alias-%%"`
-])
-
-
-# _LT_FILEUTILS_DEFAULTS
-# ----------------------
-# It is okay to use these file commands and assume they have been set
-# sensibly after `m4_require([_LT_FILEUTILS_DEFAULTS])'.
-m4_defun([_LT_FILEUTILS_DEFAULTS],
-[: ${CP="cp -f"}
-: ${MV="mv -f"}
-: ${RM="rm -f"}
-])# _LT_FILEUTILS_DEFAULTS
-
-
-# _LT_SETUP
-# ---------
-m4_defun([_LT_SETUP],
-[AC_REQUIRE([AC_CANONICAL_HOST])dnl
-AC_REQUIRE([AC_CANONICAL_BUILD])dnl
-AC_REQUIRE([_LT_PREPARE_SED_QUOTE_VARS])dnl
-AC_REQUIRE([_LT_PROG_ECHO_BACKSLASH])dnl
-
-_LT_DECL([], [PATH_SEPARATOR], [1], [The PATH separator for the build system])dnl
-dnl
-_LT_DECL([], [host_alias], [0], [The host system])dnl
-_LT_DECL([], [host], [0])dnl
-_LT_DECL([], [host_os], [0])dnl
-dnl
-_LT_DECL([], [build_alias], [0], [The build system])dnl
-_LT_DECL([], [build], [0])dnl
-_LT_DECL([], [build_os], [0])dnl
-dnl
-AC_REQUIRE([AC_PROG_CC])dnl
-AC_REQUIRE([LT_PATH_LD])dnl
-AC_REQUIRE([LT_PATH_NM])dnl
-dnl
-AC_REQUIRE([AC_PROG_LN_S])dnl
-test -z "$LN_S" && LN_S="ln -s"
-_LT_DECL([], [LN_S], [1], [Whether we need soft or hard links])dnl
-dnl
-AC_REQUIRE([LT_CMD_MAX_LEN])dnl
-_LT_DECL([objext], [ac_objext], [0], [Object file suffix (normally "o")])dnl
-_LT_DECL([], [exeext], [0], [Executable file suffix (normally "")])dnl
-dnl
-m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-m4_require([_LT_CHECK_SHELL_FEATURES])dnl
-m4_require([_LT_PATH_CONVERSION_FUNCTIONS])dnl
-m4_require([_LT_CMD_RELOAD])dnl
-m4_require([_LT_CHECK_MAGIC_METHOD])dnl
-m4_require([_LT_CHECK_SHAREDLIB_FROM_LINKLIB])dnl
-m4_require([_LT_CMD_OLD_ARCHIVE])dnl
-m4_require([_LT_CMD_GLOBAL_SYMBOLS])dnl
-m4_require([_LT_WITH_SYSROOT])dnl
-
-_LT_CONFIG_LIBTOOL_INIT([
-# See if we are running on zsh, and set the options which allow our
-# commands through without removal of \ escapes INIT.
-if test -n "\${ZSH_VERSION+set}" ; then
-   setopt NO_GLOB_SUBST
-fi
-])
-if test -n "${ZSH_VERSION+set}" ; then
-   setopt NO_GLOB_SUBST
-fi
-
-_LT_CHECK_OBJDIR
-
-m4_require([_LT_TAG_COMPILER])dnl
-
-case $host_os in
-aix3*)
-  # AIX sometimes has problems with the GCC collect2 program.  For some
-  # reason, if we set the COLLECT_NAMES environment variable, the problems
-  # vanish in a puff of smoke.
-  if test "X${COLLECT_NAMES+set}" != Xset; then
-    COLLECT_NAMES=
-    export COLLECT_NAMES
-  fi
-  ;;
-esac
-
-# Global variables:
-ofile=libtool
-can_build_shared=yes
-
-# All known linkers require a `.a' archive for static linking (except MSVC,
-# which needs '.lib').
-libext=a
-
-with_gnu_ld="$lt_cv_prog_gnu_ld"
-
-old_CC="$CC"
-old_CFLAGS="$CFLAGS"
-
-# Set sane defaults for various variables
-test -z "$CC" && CC=cc
-test -z "$LTCC" && LTCC=$CC
-test -z "$LTCFLAGS" && LTCFLAGS=$CFLAGS
-test -z "$LD" && LD=ld
-test -z "$ac_objext" && ac_objext=o
-
-_LT_CC_BASENAME([$compiler])
-
-# Only perform the check for file, if the check method requires it
-test -z "$MAGIC_CMD" && MAGIC_CMD=file
-case $deplibs_check_method in
-file_magic*)
-  if test "$file_magic_cmd" = '$MAGIC_CMD'; then
-    _LT_PATH_MAGIC
-  fi
-  ;;
-esac
-
-# Use C for the default configuration in the libtool script
-LT_SUPPORTED_TAG([CC])
-_LT_LANG_C_CONFIG
-_LT_LANG_DEFAULT_CONFIG
-_LT_CONFIG_COMMANDS
-])# _LT_SETUP
-
-
-# _LT_PREPARE_SED_QUOTE_VARS
-# --------------------------
-# Define a few sed substitution that help us do robust quoting.
-m4_defun([_LT_PREPARE_SED_QUOTE_VARS],
-[# Backslashify metacharacters that are still active within
-# double-quoted strings.
-sed_quote_subst='s/\([["`$\\]]\)/\\\1/g'
-
-# Same as above, but do not quote variable references.
-double_quote_subst='s/\([["`\\]]\)/\\\1/g'
-
-# Sed substitution to delay expansion of an escaped shell variable in a
-# double_quote_subst'ed string.
-delay_variable_subst='s/\\\\\\\\\\\$/\\\\\\$/g'
-
-# Sed substitution to delay expansion of an escaped single quote.
-delay_single_quote_subst='s/'\''/'\'\\\\\\\'\''/g'
-
-# Sed substitution to avoid accidental globbing in evaled expressions
-no_glob_subst='s/\*/\\\*/g'
-])
-
-# _LT_PROG_LTMAIN
-# ---------------
-# Note that this code is called both from `configure', and `config.status'
-# now that we use AC_CONFIG_COMMANDS to generate libtool.  Notably,
-# `config.status' has no value for ac_aux_dir unless we are using Automake,
-# so we pass a copy along to make sure it has a sensible value anyway.
-m4_defun([_LT_PROG_LTMAIN],
-[m4_ifdef([AC_REQUIRE_AUX_FILE], [AC_REQUIRE_AUX_FILE([ltmain.sh])])dnl
-_LT_CONFIG_LIBTOOL_INIT([ac_aux_dir='$ac_aux_dir'])
-ltmain="$ac_aux_dir/ltmain.sh"
-])# _LT_PROG_LTMAIN
-
-
-## ------------------------------------- ##
-## Accumulate code for creating libtool. ##
-## ------------------------------------- ##
-
-# So that we can recreate a full libtool script including additional
-# tags, we accumulate the chunks of code to send to AC_CONFIG_COMMANDS
-# in macros and then make a single call at the end using the `libtool'
-# label.
-
-
-# _LT_CONFIG_LIBTOOL_INIT([INIT-COMMANDS])
-# ----------------------------------------
-# Register INIT-COMMANDS to be passed to AC_CONFIG_COMMANDS later.
-m4_define([_LT_CONFIG_LIBTOOL_INIT],
-[m4_ifval([$1],
-          [m4_append([_LT_OUTPUT_LIBTOOL_INIT],
-                     [$1
-])])])
-
-# Initialize.
-m4_define([_LT_OUTPUT_LIBTOOL_INIT])
-
-
-# _LT_CONFIG_LIBTOOL([COMMANDS])
-# ------------------------------
-# Register COMMANDS to be passed to AC_CONFIG_COMMANDS later.
-m4_define([_LT_CONFIG_LIBTOOL],
-[m4_ifval([$1],
-          [m4_append([_LT_OUTPUT_LIBTOOL_COMMANDS],
-                     [$1
-])])])
-
-# Initialize.
-m4_define([_LT_OUTPUT_LIBTOOL_COMMANDS])
-
-
-# _LT_CONFIG_SAVE_COMMANDS([COMMANDS], [INIT_COMMANDS])
-# -----------------------------------------------------
-m4_defun([_LT_CONFIG_SAVE_COMMANDS],
-[_LT_CONFIG_LIBTOOL([$1])
-_LT_CONFIG_LIBTOOL_INIT([$2])
-])
-
-
-# _LT_FORMAT_COMMENT([COMMENT])
-# -----------------------------
-# Add leading comment marks to the start of each line, and a trailing
-# full-stop to the whole comment if one is not present already.
-m4_define([_LT_FORMAT_COMMENT],
-[m4_ifval([$1], [
-m4_bpatsubst([m4_bpatsubst([$1], [^ *], [# ])],
-              [['`$\]], [\\\&])]m4_bmatch([$1], [[!?.]$], [], [.])
-)])
-
-
-
-## ------------------------ ##
-## FIXME: Eliminate VARNAME ##
-## ------------------------ ##
-
-
-# _LT_DECL([CONFIGNAME], VARNAME, VALUE, [DESCRIPTION], [IS-TAGGED?])
-# -------------------------------------------------------------------
-# CONFIGNAME is the name given to the value in the libtool script.
-# VARNAME is the (base) name used in the configure script.
-# VALUE may be 0, 1 or 2 for a computed quote escaped value based on
-# VARNAME.  Any other value will be used directly.
-m4_define([_LT_DECL],
-[lt_if_append_uniq([lt_decl_varnames], [$2], [, ],
-    [lt_dict_add_subkey([lt_decl_dict], [$2], [libtool_name],
-	[m4_ifval([$1], [$1], [$2])])
-    lt_dict_add_subkey([lt_decl_dict], [$2], [value], [$3])
-    m4_ifval([$4],
-	[lt_dict_add_subkey([lt_decl_dict], [$2], [description], [$4])])
-    lt_dict_add_subkey([lt_decl_dict], [$2],
-	[tagged?], [m4_ifval([$5], [yes], [no])])])
-])
-
-
-# _LT_TAGDECL([CONFIGNAME], VARNAME, VALUE, [DESCRIPTION])
-# --------------------------------------------------------
-m4_define([_LT_TAGDECL], [_LT_DECL([$1], [$2], [$3], [$4], [yes])])
-
-
-# lt_decl_tag_varnames([SEPARATOR], [VARNAME1...])
-# ------------------------------------------------
-m4_define([lt_decl_tag_varnames],
-[_lt_decl_filter([tagged?], [yes], $@)])
-
-
-# _lt_decl_filter(SUBKEY, VALUE, [SEPARATOR], [VARNAME1..])
-# ---------------------------------------------------------
-m4_define([_lt_decl_filter],
-[m4_case([$#],
-  [0], [m4_fatal([$0: too few arguments: $#])],
-  [1], [m4_fatal([$0: too few arguments: $#: $1])],
-  [2], [lt_dict_filter([lt_decl_dict], [$1], [$2], [], lt_decl_varnames)],
-  [3], [lt_dict_filter([lt_decl_dict], [$1], [$2], [$3], lt_decl_varnames)],
-  [lt_dict_filter([lt_decl_dict], $@)])[]dnl
-])
-
-
-# lt_decl_quote_varnames([SEPARATOR], [VARNAME1...])
-# --------------------------------------------------
-m4_define([lt_decl_quote_varnames],
-[_lt_decl_filter([value], [1], $@)])
-
-
-# lt_decl_dquote_varnames([SEPARATOR], [VARNAME1...])
-# ---------------------------------------------------
-m4_define([lt_decl_dquote_varnames],
-[_lt_decl_filter([value], [2], $@)])
-
-
-# lt_decl_varnames_tagged([SEPARATOR], [VARNAME1...])
-# ---------------------------------------------------
-m4_define([lt_decl_varnames_tagged],
-[m4_assert([$# <= 2])dnl
-_$0(m4_quote(m4_default([$1], [[, ]])),
-    m4_ifval([$2], [[$2]], [m4_dquote(lt_decl_tag_varnames)]),
-    m4_split(m4_normalize(m4_quote(_LT_TAGS)), [ ]))])
-m4_define([_lt_decl_varnames_tagged],
-[m4_ifval([$3], [lt_combine([$1], [$2], [_], $3)])])
-
-
-# lt_decl_all_varnames([SEPARATOR], [VARNAME1...])
-# ------------------------------------------------
-m4_define([lt_decl_all_varnames],
-[_$0(m4_quote(m4_default([$1], [[, ]])),
-     m4_if([$2], [],
-	   m4_quote(lt_decl_varnames),
-	m4_quote(m4_shift($@))))[]dnl
-])
-m4_define([_lt_decl_all_varnames],
-[lt_join($@, lt_decl_varnames_tagged([$1],
-			lt_decl_tag_varnames([[, ]], m4_shift($@))))dnl
-])
-
-
-# _LT_CONFIG_STATUS_DECLARE([VARNAME])
-# ------------------------------------
-# Quote a variable value, and forward it to `config.status' so that its
-# declaration there will have the same value as in `configure'.  VARNAME
-# must have a single quote delimited value for this to work.
-m4_define([_LT_CONFIG_STATUS_DECLARE],
-[$1='`$ECHO "$][$1" | $SED "$delay_single_quote_subst"`'])
-
-
-# _LT_CONFIG_STATUS_DECLARATIONS
-# ------------------------------
-# We delimit libtool config variables with single quotes, so when
-# we write them to config.status, we have to be sure to quote all
-# embedded single quotes properly.  In configure, this macro expands
-# each variable declared with _LT_DECL (and _LT_TAGDECL) into:
-#
-#    <var>='`$ECHO "$<var>" | $SED "$delay_single_quote_subst"`'
-m4_defun([_LT_CONFIG_STATUS_DECLARATIONS],
-[m4_foreach([_lt_var], m4_quote(lt_decl_all_varnames),
-    [m4_n([_LT_CONFIG_STATUS_DECLARE(_lt_var)])])])
-
-
-# _LT_LIBTOOL_TAGS
-# ----------------
-# Output comment and list of tags supported by the script
-m4_defun([_LT_LIBTOOL_TAGS],
-[_LT_FORMAT_COMMENT([The names of the tagged configurations supported by this script])dnl
-available_tags="_LT_TAGS"dnl
-])
-
-
-# _LT_LIBTOOL_DECLARE(VARNAME, [TAG])
-# -----------------------------------
-# Extract the dictionary values for VARNAME (optionally with TAG) and
-# expand to a commented shell variable setting:
-#
-#    # Some comment about what VAR is for.
-#    visible_name=$lt_internal_name
-m4_define([_LT_LIBTOOL_DECLARE],
-[_LT_FORMAT_COMMENT(m4_quote(lt_dict_fetch([lt_decl_dict], [$1],
-					   [description])))[]dnl
-m4_pushdef([_libtool_name],
-    m4_quote(lt_dict_fetch([lt_decl_dict], [$1], [libtool_name])))[]dnl
-m4_case(m4_quote(lt_dict_fetch([lt_decl_dict], [$1], [value])),
-    [0], [_libtool_name=[$]$1],
-    [1], [_libtool_name=$lt_[]$1],
-    [2], [_libtool_name=$lt_[]$1],
-    [_libtool_name=lt_dict_fetch([lt_decl_dict], [$1], [value])])[]dnl
-m4_ifval([$2], [_$2])[]m4_popdef([_libtool_name])[]dnl
-])
-
-
-# _LT_LIBTOOL_CONFIG_VARS
-# -----------------------
-# Produce commented declarations of non-tagged libtool config variables
-# suitable for insertion in the LIBTOOL CONFIG section of the `libtool'
-# script.  Tagged libtool config variables (even for the LIBTOOL CONFIG
-# section) are produced by _LT_LIBTOOL_TAG_VARS.
-m4_defun([_LT_LIBTOOL_CONFIG_VARS],
-[m4_foreach([_lt_var],
-    m4_quote(_lt_decl_filter([tagged?], [no], [], lt_decl_varnames)),
-    [m4_n([_LT_LIBTOOL_DECLARE(_lt_var)])])])
-
-
-# _LT_LIBTOOL_TAG_VARS(TAG)
-# -------------------------
-m4_define([_LT_LIBTOOL_TAG_VARS],
-[m4_foreach([_lt_var], m4_quote(lt_decl_tag_varnames),
-    [m4_n([_LT_LIBTOOL_DECLARE(_lt_var, [$1])])])])
-
-
-# _LT_TAGVAR(VARNAME, [TAGNAME])
-# ------------------------------
-m4_define([_LT_TAGVAR], [m4_ifval([$2], [$1_$2], [$1])])
-
-
-# _LT_CONFIG_COMMANDS
-# -------------------
-# Send accumulated output to $CONFIG_STATUS.  Thanks to the lists of
-# variables for single and double quote escaping we saved from calls
-# to _LT_DECL, we can put quote escaped variables declarations
-# into `config.status', and then the shell code to quote escape them in
-# for loops in `config.status'.  Finally, any additional code accumulated
-# from calls to _LT_CONFIG_LIBTOOL_INIT is expanded.
-m4_defun([_LT_CONFIG_COMMANDS],
-[AC_PROVIDE_IFELSE([LT_OUTPUT],
-	dnl If the libtool generation code has been placed in $CONFIG_LT,
-	dnl instead of duplicating it all over again into config.status,
-	dnl then we will have config.status run $CONFIG_LT later, so it
-	dnl needs to know what name is stored there:
-        [AC_CONFIG_COMMANDS([libtool],
-            [$SHELL $CONFIG_LT || AS_EXIT(1)], [CONFIG_LT='$CONFIG_LT'])],
-    dnl If the libtool generation code is destined for config.status,
-    dnl expand the accumulated commands and init code now:
-    [AC_CONFIG_COMMANDS([libtool],
-        [_LT_OUTPUT_LIBTOOL_COMMANDS], [_LT_OUTPUT_LIBTOOL_COMMANDS_INIT])])
-])#_LT_CONFIG_COMMANDS
-
-
-# Initialize.
-m4_define([_LT_OUTPUT_LIBTOOL_COMMANDS_INIT],
-[
-
-# The HP-UX ksh and POSIX shell print the target directory to stdout
-# if CDPATH is set.
-(unset CDPATH) >/dev/null 2>&1 && unset CDPATH
-
-sed_quote_subst='$sed_quote_subst'
-double_quote_subst='$double_quote_subst'
-delay_variable_subst='$delay_variable_subst'
-_LT_CONFIG_STATUS_DECLARATIONS
-LTCC='$LTCC'
-LTCFLAGS='$LTCFLAGS'
-compiler='$compiler_DEFAULT'
-
-# A function that is used when there is no print builtin or printf.
-func_fallback_echo ()
-{
-  eval 'cat <<_LTECHO_EOF
-\$[]1
-_LTECHO_EOF'
-}
-
-# Quote evaled strings.
-for var in lt_decl_all_varnames([[ \
-]], lt_decl_quote_varnames); do
-    case \`eval \\\\\$ECHO \\\\""\\\\\$\$var"\\\\"\` in
-    *[[\\\\\\\`\\"\\\$]]*)
-      eval "lt_\$var=\\\\\\"\\\`\\\$ECHO \\"\\\$\$var\\" | \\\$SED \\"\\\$sed_quote_subst\\"\\\`\\\\\\""
-      ;;
-    *)
-      eval "lt_\$var=\\\\\\"\\\$\$var\\\\\\""
-      ;;
-    esac
-done
-
-# Double-quote double-evaled strings.
-for var in lt_decl_all_varnames([[ \
-]], lt_decl_dquote_varnames); do
-    case \`eval \\\\\$ECHO \\\\""\\\\\$\$var"\\\\"\` in
-    *[[\\\\\\\`\\"\\\$]]*)
-      eval "lt_\$var=\\\\\\"\\\`\\\$ECHO \\"\\\$\$var\\" | \\\$SED -e \\"\\\$double_quote_subst\\" -e \\"\\\$sed_quote_subst\\" -e \\"\\\$delay_variable_subst\\"\\\`\\\\\\""
-      ;;
-    *)
-      eval "lt_\$var=\\\\\\"\\\$\$var\\\\\\""
-      ;;
-    esac
-done
-
-_LT_OUTPUT_LIBTOOL_INIT
-])
-
-# _LT_GENERATED_FILE_INIT(FILE, [COMMENT])
-# ------------------------------------
-# Generate a child script FILE with all initialization necessary to
-# reuse the environment learned by the parent script, and make the
-# file executable.  If COMMENT is supplied, it is inserted after the
-# `#!' sequence but before initialization text begins.  After this
-# macro, additional text can be appended to FILE to form the body of
-# the child script.  The macro ends with non-zero status if the
-# file could not be fully written (such as if the disk is full).
-m4_ifdef([AS_INIT_GENERATED],
-[m4_defun([_LT_GENERATED_FILE_INIT],[AS_INIT_GENERATED($@)])],
-[m4_defun([_LT_GENERATED_FILE_INIT],
-[m4_require([AS_PREPARE])]dnl
-[m4_pushdef([AS_MESSAGE_LOG_FD])]dnl
-[lt_write_fail=0
-cat >$1 <<_ASEOF || lt_write_fail=1
-#! $SHELL
-# Generated by $as_me.
-$2
-SHELL=\${CONFIG_SHELL-$SHELL}
-export SHELL
-_ASEOF
-cat >>$1 <<\_ASEOF || lt_write_fail=1
-AS_SHELL_SANITIZE
-_AS_PREPARE
-exec AS_MESSAGE_FD>&1
-_ASEOF
-test $lt_write_fail = 0 && chmod +x $1[]dnl
-m4_popdef([AS_MESSAGE_LOG_FD])])])# _LT_GENERATED_FILE_INIT
-
-# LT_OUTPUT
-# ---------
-# This macro allows early generation of the libtool script (before
-# AC_OUTPUT is called), incase it is used in configure for compilation
-# tests.
-AC_DEFUN([LT_OUTPUT],
-[: ${CONFIG_LT=./config.lt}
-AC_MSG_NOTICE([creating $CONFIG_LT])
-_LT_GENERATED_FILE_INIT(["$CONFIG_LT"],
-[# Run this file to recreate a libtool stub with the current configuration.])
-
-cat >>"$CONFIG_LT" <<\_LTEOF
-lt_cl_silent=false
-exec AS_MESSAGE_LOG_FD>>config.log
-{
-  echo
-  AS_BOX([Running $as_me.])
-} >&AS_MESSAGE_LOG_FD
-
-lt_cl_help="\
-\`$as_me' creates a local libtool stub from the current configuration,
-for use in further configure time tests before the real libtool is
-generated.
-
-Usage: $[0] [[OPTIONS]]
-
-  -h, --help      print this help, then exit
-  -V, --version   print version number, then exit
-  -q, --quiet     do not print progress messages
-  -d, --debug     don't remove temporary files
-
-Report bugs to <bug-libtool@gnu.org>."
-
-lt_cl_version="\
-m4_ifset([AC_PACKAGE_NAME], [AC_PACKAGE_NAME ])config.lt[]dnl
-m4_ifset([AC_PACKAGE_VERSION], [ AC_PACKAGE_VERSION])
-configured by $[0], generated by m4_PACKAGE_STRING.
-
-Copyright (C) 2011 Free Software Foundation, Inc.
-This config.lt script is free software; the Free Software Foundation
-gives unlimited permision to copy, distribute and modify it."
-
-while test $[#] != 0
-do
-  case $[1] in
-    --version | --v* | -V )
-      echo "$lt_cl_version"; exit 0 ;;
-    --help | --h* | -h )
-      echo "$lt_cl_help"; exit 0 ;;
-    --debug | --d* | -d )
-      debug=: ;;
-    --quiet | --q* | --silent | --s* | -q )
-      lt_cl_silent=: ;;
-
-    -*) AC_MSG_ERROR([unrecognized option: $[1]
-Try \`$[0] --help' for more information.]) ;;
-
-    *) AC_MSG_ERROR([unrecognized argument: $[1]
-Try \`$[0] --help' for more information.]) ;;
-  esac
-  shift
-done
-
-if $lt_cl_silent; then
-  exec AS_MESSAGE_FD>/dev/null
-fi
-_LTEOF
-
-cat >>"$CONFIG_LT" <<_LTEOF
-_LT_OUTPUT_LIBTOOL_COMMANDS_INIT
-_LTEOF
-
-cat >>"$CONFIG_LT" <<\_LTEOF
-AC_MSG_NOTICE([creating $ofile])
-_LT_OUTPUT_LIBTOOL_COMMANDS
-AS_EXIT(0)
-_LTEOF
-chmod +x "$CONFIG_LT"
-
-# configure is writing to config.log, but config.lt does its own redirection,
-# appending to config.log, which fails on DOS, as config.log is still kept
-# open by configure.  Here we exec the FD to /dev/null, effectively closing
-# config.log, so it can be properly (re)opened and appended to by config.lt.
-lt_cl_success=:
-test "$silent" = yes &&
-  lt_config_lt_args="$lt_config_lt_args --quiet"
-exec AS_MESSAGE_LOG_FD>/dev/null
-$SHELL "$CONFIG_LT" $lt_config_lt_args || lt_cl_success=false
-exec AS_MESSAGE_LOG_FD>>config.log
-$lt_cl_success || AS_EXIT(1)
-])# LT_OUTPUT
-
-
-# _LT_CONFIG(TAG)
-# ---------------
-# If TAG is the built-in tag, create an initial libtool script with a
-# default configuration from the untagged config vars.  Otherwise add code
-# to config.status for appending the configuration named by TAG from the
-# matching tagged config vars.
-m4_defun([_LT_CONFIG],
-[m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-_LT_CONFIG_SAVE_COMMANDS([
-  m4_define([_LT_TAG], m4_if([$1], [], [C], [$1]))dnl
-  m4_if(_LT_TAG, [C], [
-    # See if we are running on zsh, and set the options which allow our
-    # commands through without removal of \ escapes.
-    if test -n "${ZSH_VERSION+set}" ; then
-      setopt NO_GLOB_SUBST
-    fi
-
-    cfgfile="${ofile}T"
-    trap "$RM \"$cfgfile\"; exit 1" 1 2 15
-    $RM "$cfgfile"
-
-    cat <<_LT_EOF >> "$cfgfile"
-#! $SHELL
-
-# `$ECHO "$ofile" | sed 's%^.*/%%'` - Provide generalized library-building support services.
-# Generated automatically by $as_me ($PACKAGE$TIMESTAMP) $VERSION
-# Libtool was configured on host `(hostname || uname -n) 2>/dev/null | sed 1q`:
-# NOTE: Changes made to this file will be lost: look at ltmain.sh.
-#
-_LT_COPYING
-_LT_LIBTOOL_TAGS
-
-# ### BEGIN LIBTOOL CONFIG
-_LT_LIBTOOL_CONFIG_VARS
-_LT_LIBTOOL_TAG_VARS
-# ### END LIBTOOL CONFIG
-
-_LT_EOF
-
-  case $host_os in
-  aix3*)
-    cat <<\_LT_EOF >> "$cfgfile"
-# AIX sometimes has problems with the GCC collect2 program.  For some
-# reason, if we set the COLLECT_NAMES environment variable, the problems
-# vanish in a puff of smoke.
-if test "X${COLLECT_NAMES+set}" != Xset; then
-  COLLECT_NAMES=
-  export COLLECT_NAMES
-fi
-_LT_EOF
-    ;;
-  esac
-
-  _LT_PROG_LTMAIN
-
-  # We use sed instead of cat because bash on DJGPP gets confused if
-  # if finds mixed CR/LF and LF-only lines.  Since sed operates in
-  # text mode, it properly converts lines to CR/LF.  This bash problem
-  # is reportedly fixed, but why not run on old versions too?
-  sed '$q' "$ltmain" >> "$cfgfile" \
-     || (rm -f "$cfgfile"; exit 1)
-
-  _LT_PROG_REPLACE_SHELLFNS
-
-   mv -f "$cfgfile" "$ofile" ||
-    (rm -f "$ofile" && cp "$cfgfile" "$ofile" && rm -f "$cfgfile")
-  chmod +x "$ofile"
-],
-[cat <<_LT_EOF >> "$ofile"
-
-dnl Unfortunately we have to use $1 here, since _LT_TAG is not expanded
-dnl in a comment (ie after a #).
-# ### BEGIN LIBTOOL TAG CONFIG: $1
-_LT_LIBTOOL_TAG_VARS(_LT_TAG)
-# ### END LIBTOOL TAG CONFIG: $1
-_LT_EOF
-])dnl /m4_if
-],
-[m4_if([$1], [], [
-    PACKAGE='$PACKAGE'
-    VERSION='$VERSION'
-    TIMESTAMP='$TIMESTAMP'
-    RM='$RM'
-    ofile='$ofile'], [])
-])dnl /_LT_CONFIG_SAVE_COMMANDS
-])# _LT_CONFIG
-
-
-# LT_SUPPORTED_TAG(TAG)
-# ---------------------
-# Trace this macro to discover what tags are supported by the libtool
-# --tag option, using:
-#    autoconf --trace 'LT_SUPPORTED_TAG:$1'
-AC_DEFUN([LT_SUPPORTED_TAG], [])
-
-
-# C support is built-in for now
-m4_define([_LT_LANG_C_enabled], [])
-m4_define([_LT_TAGS], [])
-
-
-# LT_LANG(LANG)
-# -------------
-# Enable libtool support for the given language if not already enabled.
-AC_DEFUN([LT_LANG],
-[AC_BEFORE([$0], [LT_OUTPUT])dnl
-m4_case([$1],
-  [C],			[_LT_LANG(C)],
-  [C++],		[_LT_LANG(CXX)],
-  [Go],			[_LT_LANG(GO)],
-  [Java],		[_LT_LANG(GCJ)],
-  [Fortran 77],		[_LT_LANG(F77)],
-  [Fortran],		[_LT_LANG(FC)],
-  [Windows Resource],	[_LT_LANG(RC)],
-  [m4_ifdef([_LT_LANG_]$1[_CONFIG],
-    [_LT_LANG($1)],
-    [m4_fatal([$0: unsupported language: "$1"])])])dnl
-])# LT_LANG
-
-
-# _LT_LANG(LANGNAME)
-# ------------------
-m4_defun([_LT_LANG],
-[m4_ifdef([_LT_LANG_]$1[_enabled], [],
-  [LT_SUPPORTED_TAG([$1])dnl
-  m4_append([_LT_TAGS], [$1 ])dnl
-  m4_define([_LT_LANG_]$1[_enabled], [])dnl
-  _LT_LANG_$1_CONFIG($1)])dnl
-])# _LT_LANG
-
-
-m4_ifndef([AC_PROG_GO], [
-############################################################
-# NOTE: This macro has been submitted for inclusion into   #
-#  GNU Autoconf as AC_PROG_GO.  When it is available in    #
-#  a released version of Autoconf we should remove this    #
-#  macro and use it instead.                               #
-############################################################
-m4_defun([AC_PROG_GO],
-[AC_LANG_PUSH(Go)dnl
-AC_ARG_VAR([GOC],     [Go compiler command])dnl
-AC_ARG_VAR([GOFLAGS], [Go compiler flags])dnl
-_AC_ARG_VAR_LDFLAGS()dnl
-AC_CHECK_TOOL(GOC, gccgo)
-if test -z "$GOC"; then
-  if test -n "$ac_tool_prefix"; then
-    AC_CHECK_PROG(GOC, [${ac_tool_prefix}gccgo], [${ac_tool_prefix}gccgo])
-  fi
-fi
-if test -z "$GOC"; then
-  AC_CHECK_PROG(GOC, gccgo, gccgo, false)
-fi
-])#m4_defun
-])#m4_ifndef
-
-
-# _LT_LANG_DEFAULT_CONFIG
-# -----------------------
-m4_defun([_LT_LANG_DEFAULT_CONFIG],
-[AC_PROVIDE_IFELSE([AC_PROG_CXX],
-  [LT_LANG(CXX)],
-  [m4_define([AC_PROG_CXX], defn([AC_PROG_CXX])[LT_LANG(CXX)])])
-
-AC_PROVIDE_IFELSE([AC_PROG_F77],
-  [LT_LANG(F77)],
-  [m4_define([AC_PROG_F77], defn([AC_PROG_F77])[LT_LANG(F77)])])
-
-AC_PROVIDE_IFELSE([AC_PROG_FC],
-  [LT_LANG(FC)],
-  [m4_define([AC_PROG_FC], defn([AC_PROG_FC])[LT_LANG(FC)])])
-
-dnl The call to [A][M_PROG_GCJ] is quoted like that to stop aclocal
-dnl pulling things in needlessly.
-AC_PROVIDE_IFELSE([AC_PROG_GCJ],
-  [LT_LANG(GCJ)],
-  [AC_PROVIDE_IFELSE([A][M_PROG_GCJ],
-    [LT_LANG(GCJ)],
-    [AC_PROVIDE_IFELSE([LT_PROG_GCJ],
-      [LT_LANG(GCJ)],
-      [m4_ifdef([AC_PROG_GCJ],
-	[m4_define([AC_PROG_GCJ], defn([AC_PROG_GCJ])[LT_LANG(GCJ)])])
-       m4_ifdef([A][M_PROG_GCJ],
-	[m4_define([A][M_PROG_GCJ], defn([A][M_PROG_GCJ])[LT_LANG(GCJ)])])
-       m4_ifdef([LT_PROG_GCJ],
-	[m4_define([LT_PROG_GCJ], defn([LT_PROG_GCJ])[LT_LANG(GCJ)])])])])])
-
-AC_PROVIDE_IFELSE([AC_PROG_GO],
-  [LT_LANG(GO)],
-  [m4_define([AC_PROG_GO], defn([AC_PROG_GO])[LT_LANG(GO)])])
-
-AC_PROVIDE_IFELSE([LT_PROG_RC],
-  [LT_LANG(RC)],
-  [m4_define([LT_PROG_RC], defn([LT_PROG_RC])[LT_LANG(RC)])])
-])# _LT_LANG_DEFAULT_CONFIG
-
-# Obsolete macros:
-AU_DEFUN([AC_LIBTOOL_CXX], [LT_LANG(C++)])
-AU_DEFUN([AC_LIBTOOL_F77], [LT_LANG(Fortran 77)])
-AU_DEFUN([AC_LIBTOOL_FC], [LT_LANG(Fortran)])
-AU_DEFUN([AC_LIBTOOL_GCJ], [LT_LANG(Java)])
-AU_DEFUN([AC_LIBTOOL_RC], [LT_LANG(Windows Resource)])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_CXX], [])
-dnl AC_DEFUN([AC_LIBTOOL_F77], [])
-dnl AC_DEFUN([AC_LIBTOOL_FC], [])
-dnl AC_DEFUN([AC_LIBTOOL_GCJ], [])
-dnl AC_DEFUN([AC_LIBTOOL_RC], [])
-
-
-# _LT_TAG_COMPILER
-# ----------------
-m4_defun([_LT_TAG_COMPILER],
-[AC_REQUIRE([AC_PROG_CC])dnl
-
-_LT_DECL([LTCC], [CC], [1], [A C compiler])dnl
-_LT_DECL([LTCFLAGS], [CFLAGS], [1], [LTCC compiler flags])dnl
-_LT_TAGDECL([CC], [compiler], [1], [A language specific compiler])dnl
-_LT_TAGDECL([with_gcc], [GCC], [0], [Is the compiler the GNU compiler?])dnl
-
-# If no C compiler was specified, use CC.
-LTCC=${LTCC-"$CC"}
-
-# If no C compiler flags were specified, use CFLAGS.
-LTCFLAGS=${LTCFLAGS-"$CFLAGS"}
-
-# Allow CC to be a program name with arguments.
-compiler=$CC
-])# _LT_TAG_COMPILER
-
-
-# _LT_COMPILER_BOILERPLATE
-# ------------------------
-# Check for compiler boilerplate output or warnings with
-# the simple compiler test code.
-m4_defun([_LT_COMPILER_BOILERPLATE],
-[m4_require([_LT_DECL_SED])dnl
-ac_outfile=conftest.$ac_objext
-echo "$lt_simple_compile_test_code" >conftest.$ac_ext
-eval "$ac_compile" 2>&1 >/dev/null | $SED '/^$/d; /^ *+/d' >conftest.err
-_lt_compiler_boilerplate=`cat conftest.err`
-$RM conftest*
-])# _LT_COMPILER_BOILERPLATE
-
-
-# _LT_LINKER_BOILERPLATE
-# ----------------------
-# Check for linker boilerplate output or warnings with
-# the simple link test code.
-m4_defun([_LT_LINKER_BOILERPLATE],
-[m4_require([_LT_DECL_SED])dnl
-ac_outfile=conftest.$ac_objext
-echo "$lt_simple_link_test_code" >conftest.$ac_ext
-eval "$ac_link" 2>&1 >/dev/null | $SED '/^$/d; /^ *+/d' >conftest.err
-_lt_linker_boilerplate=`cat conftest.err`
-$RM -r conftest*
-])# _LT_LINKER_BOILERPLATE
-
-# _LT_REQUIRED_DARWIN_CHECKS
-# -------------------------
-m4_defun_once([_LT_REQUIRED_DARWIN_CHECKS],[
-  case $host_os in
-    rhapsody* | darwin*)
-    AC_CHECK_TOOL([DSYMUTIL], [dsymutil], [:])
-    AC_CHECK_TOOL([NMEDIT], [nmedit], [:])
-    AC_CHECK_TOOL([LIPO], [lipo], [:])
-    AC_CHECK_TOOL([OTOOL], [otool], [:])
-    AC_CHECK_TOOL([OTOOL64], [otool64], [:])
-    _LT_DECL([], [DSYMUTIL], [1],
-      [Tool to manipulate archived DWARF debug symbol files on Mac OS X])
-    _LT_DECL([], [NMEDIT], [1],
-      [Tool to change global to local symbols on Mac OS X])
-    _LT_DECL([], [LIPO], [1],
-      [Tool to manipulate fat objects and archives on Mac OS X])
-    _LT_DECL([], [OTOOL], [1],
-      [ldd/readelf like tool for Mach-O binaries on Mac OS X])
-    _LT_DECL([], [OTOOL64], [1],
-      [ldd/readelf like tool for 64 bit Mach-O binaries on Mac OS X 10.4])
-
-    AC_CACHE_CHECK([for -single_module linker flag],[lt_cv_apple_cc_single_mod],
-      [lt_cv_apple_cc_single_mod=no
-      if test -z "${LT_MULTI_MODULE}"; then
-	# By default we will add the -single_module flag. You can override
-	# by either setting the environment variable LT_MULTI_MODULE
-	# non-empty at configure time, or by adding -multi_module to the
-	# link flags.
-	rm -rf libconftest.dylib*
-	echo "int foo(void){return 1;}" > conftest.c
-	echo "$LTCC $LTCFLAGS $LDFLAGS -o libconftest.dylib \
--dynamiclib -Wl,-single_module conftest.c" >&AS_MESSAGE_LOG_FD
-	$LTCC $LTCFLAGS $LDFLAGS -o libconftest.dylib \
-	  -dynamiclib -Wl,-single_module conftest.c 2>conftest.err
-        _lt_result=$?
-	# If there is a non-empty error log, and "single_module"
-	# appears in it, assume the flag caused a linker warning
-        if test -s conftest.err && $GREP single_module conftest.err; then
-	  cat conftest.err >&AS_MESSAGE_LOG_FD
-	# Otherwise, if the output was created with a 0 exit code from
-	# the compiler, it worked.
-	elif test -f libconftest.dylib && test $_lt_result -eq 0; then
-	  lt_cv_apple_cc_single_mod=yes
-	else
-	  cat conftest.err >&AS_MESSAGE_LOG_FD
-	fi
-	rm -rf libconftest.dylib*
-	rm -f conftest.*
-      fi])
-
-    AC_CACHE_CHECK([for -exported_symbols_list linker flag],
-      [lt_cv_ld_exported_symbols_list],
-      [lt_cv_ld_exported_symbols_list=no
-      save_LDFLAGS=$LDFLAGS
-      echo "_main" > conftest.sym
-      LDFLAGS="$LDFLAGS -Wl,-exported_symbols_list,conftest.sym"
-      AC_LINK_IFELSE([AC_LANG_PROGRAM([],[])],
-	[lt_cv_ld_exported_symbols_list=yes],
-	[lt_cv_ld_exported_symbols_list=no])
-	LDFLAGS="$save_LDFLAGS"
-    ])
-
-    AC_CACHE_CHECK([for -force_load linker flag],[lt_cv_ld_force_load],
-      [lt_cv_ld_force_load=no
-      cat > conftest.c << _LT_EOF
-int forced_loaded() { return 2;}
-_LT_EOF
-      echo "$LTCC $LTCFLAGS -c -o conftest.o conftest.c" >&AS_MESSAGE_LOG_FD
-      $LTCC $LTCFLAGS -c -o conftest.o conftest.c 2>&AS_MESSAGE_LOG_FD
-      echo "$AR cru libconftest.a conftest.o" >&AS_MESSAGE_LOG_FD
-      $AR cru libconftest.a conftest.o 2>&AS_MESSAGE_LOG_FD
-      echo "$RANLIB libconftest.a" >&AS_MESSAGE_LOG_FD
-      $RANLIB libconftest.a 2>&AS_MESSAGE_LOG_FD
-      cat > conftest.c << _LT_EOF
-int main() { return 0;}
-_LT_EOF
-      echo "$LTCC $LTCFLAGS $LDFLAGS -o conftest conftest.c -Wl,-force_load,./libconftest.a" >&AS_MESSAGE_LOG_FD
-      $LTCC $LTCFLAGS $LDFLAGS -o conftest conftest.c -Wl,-force_load,./libconftest.a 2>conftest.err
-      _lt_result=$?
-      if test -s conftest.err && $GREP force_load conftest.err; then
-	cat conftest.err >&AS_MESSAGE_LOG_FD
-      elif test -f conftest && test $_lt_result -eq 0 && $GREP forced_load conftest >/dev/null 2>&1 ; then
-	lt_cv_ld_force_load=yes
-      else
-	cat conftest.err >&AS_MESSAGE_LOG_FD
-      fi
-        rm -f conftest.err libconftest.a conftest conftest.c
-        rm -rf conftest.dSYM
-    ])
-    case $host_os in
-    rhapsody* | darwin1.[[012]])
-      _lt_dar_allow_undefined='${wl}-undefined ${wl}suppress' ;;
-    darwin1.*)
-      _lt_dar_allow_undefined='${wl}-flat_namespace ${wl}-undefined ${wl}suppress' ;;
-    darwin*) # darwin 5.x on
-      # if running on 10.5 or later, the deployment target defaults
-      # to the OS version, if on x86, and 10.4, the deployment
-      # target defaults to 10.4. Don't you love it?
-      case ${MACOSX_DEPLOYMENT_TARGET-10.0},$host in
-	10.0,*86*-darwin8*|10.0,*-darwin[[91]]*)
-	  _lt_dar_allow_undefined='${wl}-undefined ${wl}dynamic_lookup' ;;
-	10.[[012]]*)
-	  _lt_dar_allow_undefined='${wl}-flat_namespace ${wl}-undefined ${wl}suppress' ;;
-	10.*)
-	  _lt_dar_allow_undefined='${wl}-undefined ${wl}dynamic_lookup' ;;
-      esac
-    ;;
-  esac
-    if test "$lt_cv_apple_cc_single_mod" = "yes"; then
-      _lt_dar_single_mod='$single_module'
-    fi
-    if test "$lt_cv_ld_exported_symbols_list" = "yes"; then
-      _lt_dar_export_syms=' ${wl}-exported_symbols_list,$output_objdir/${libname}-symbols.expsym'
-    else
-      _lt_dar_export_syms='~$NMEDIT -s $output_objdir/${libname}-symbols.expsym ${lib}'
-    fi
-    if test "$DSYMUTIL" != ":" && test "$lt_cv_ld_force_load" = "no"; then
-      _lt_dsymutil='~$DSYMUTIL $lib || :'
-    else
-      _lt_dsymutil=
-    fi
-    ;;
-  esac
-])
-
-
-# _LT_DARWIN_LINKER_FEATURES([TAG])
-# ---------------------------------
-# Checks for linker and compiler features on darwin
-m4_defun([_LT_DARWIN_LINKER_FEATURES],
-[
-  m4_require([_LT_REQUIRED_DARWIN_CHECKS])
-  _LT_TAGVAR(archive_cmds_need_lc, $1)=no
-  _LT_TAGVAR(hardcode_direct, $1)=no
-  _LT_TAGVAR(hardcode_automatic, $1)=yes
-  _LT_TAGVAR(hardcode_shlibpath_var, $1)=unsupported
-  if test "$lt_cv_ld_force_load" = "yes"; then
-    _LT_TAGVAR(whole_archive_flag_spec, $1)='`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience ${wl}-force_load,$conv\"; done; func_echo_all \"$new_convenience\"`'
-    m4_case([$1], [F77], [_LT_TAGVAR(compiler_needs_object, $1)=yes],
-                  [FC],  [_LT_TAGVAR(compiler_needs_object, $1)=yes])
-  else
-    _LT_TAGVAR(whole_archive_flag_spec, $1)=''
-  fi
-  _LT_TAGVAR(link_all_deplibs, $1)=yes
-  _LT_TAGVAR(allow_undefined_flag, $1)="$_lt_dar_allow_undefined"
-  case $cc_basename in
-     ifort*) _lt_dar_can_shared=yes ;;
-     *) _lt_dar_can_shared=$GCC ;;
-  esac
-  if test "$_lt_dar_can_shared" = "yes"; then
-    output_verbose_link_cmd=func_echo_all
-    _LT_TAGVAR(archive_cmds, $1)="\$CC -dynamiclib \$allow_undefined_flag -o \$lib \$libobjs \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring $_lt_dar_single_mod${_lt_dsymutil}"
-    _LT_TAGVAR(module_cmds, $1)="\$CC \$allow_undefined_flag -o \$lib -bundle \$libobjs \$deplibs \$compiler_flags${_lt_dsymutil}"
-    _LT_TAGVAR(archive_expsym_cmds, $1)="sed 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC -dynamiclib \$allow_undefined_flag -o \$lib \$libobjs \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring ${_lt_dar_single_mod}${_lt_dar_export_syms}${_lt_dsymutil}"
-    _LT_TAGVAR(module_expsym_cmds, $1)="sed -e 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC \$allow_undefined_flag -o \$lib -bundle \$libobjs \$deplibs \$compiler_flags${_lt_dar_export_syms}${_lt_dsymutil}"
-    m4_if([$1], [CXX],
-[   if test "$lt_cv_apple_cc_single_mod" != "yes"; then
-      _LT_TAGVAR(archive_cmds, $1)="\$CC -r -keep_private_externs -nostdlib -o \${lib}-master.o \$libobjs~\$CC -dynamiclib \$allow_undefined_flag -o \$lib \${lib}-master.o \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring${_lt_dsymutil}"
-      _LT_TAGVAR(archive_expsym_cmds, $1)="sed 's,^,_,' < \$export_symbols > \$output_objdir/\${libname}-symbols.expsym~\$CC -r -keep_private_externs -nostdlib -o \${lib}-master.o \$libobjs~\$CC -dynamiclib \$allow_undefined_flag -o \$lib \${lib}-master.o \$deplibs \$compiler_flags -install_name \$rpath/\$soname \$verstring${_lt_dar_export_syms}${_lt_dsymutil}"
-    fi
-],[])
-  else
-  _LT_TAGVAR(ld_shlibs, $1)=no
-  fi
-])
-
-# _LT_SYS_MODULE_PATH_AIX([TAGNAME])
-# ----------------------------------
-# Links a minimal program and checks the executable
-# for the system default hardcoded library path. In most cases,
-# this is /usr/lib:/lib, but when the MPI compilers are used
-# the location of the communication and MPI libs are included too.
-# If we don't find anything, use the default library path according
-# to the aix ld manual.
-# Store the results from the different compilers for each TAGNAME.
-# Allow to override them for all tags through lt_cv_aix_libpath.
-m4_defun([_LT_SYS_MODULE_PATH_AIX],
-[m4_require([_LT_DECL_SED])dnl
-if test "${lt_cv_aix_libpath+set}" = set; then
-  aix_libpath=$lt_cv_aix_libpath
-else
-  AC_CACHE_VAL([_LT_TAGVAR([lt_cv_aix_libpath_], [$1])],
-  [AC_LINK_IFELSE([AC_LANG_PROGRAM],[
-  lt_aix_libpath_sed='[
-      /Import File Strings/,/^$/ {
-	  /^0/ {
-	      s/^0  *\([^ ]*\) *$/\1/
-	      p
-	  }
-      }]'
-  _LT_TAGVAR([lt_cv_aix_libpath_], [$1])=`dump -H conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  # Check for a 64-bit object if we didn't find anything.
-  if test -z "$_LT_TAGVAR([lt_cv_aix_libpath_], [$1])"; then
-    _LT_TAGVAR([lt_cv_aix_libpath_], [$1])=`dump -HX64 conftest$ac_exeext 2>/dev/null | $SED -n -e "$lt_aix_libpath_sed"`
-  fi],[])
-  if test -z "$_LT_TAGVAR([lt_cv_aix_libpath_], [$1])"; then
-    _LT_TAGVAR([lt_cv_aix_libpath_], [$1])="/usr/lib:/lib"
-  fi
-  ])
-  aix_libpath=$_LT_TAGVAR([lt_cv_aix_libpath_], [$1])
-fi
-])# _LT_SYS_MODULE_PATH_AIX
-
-
-# _LT_SHELL_INIT(ARG)
-# -------------------
-m4_define([_LT_SHELL_INIT],
-[m4_divert_text([M4SH-INIT], [$1
-])])# _LT_SHELL_INIT
-
-
-
-# _LT_PROG_ECHO_BACKSLASH
-# -----------------------
-# Find how we can fake an echo command that does not interpret backslash.
-# In particular, with Autoconf 2.60 or later we add some code to the start
-# of the generated configure script which will find a shell with a builtin
-# printf (which we can use as an echo command).
-m4_defun([_LT_PROG_ECHO_BACKSLASH],
-[ECHO='\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\'
-ECHO=$ECHO$ECHO$ECHO$ECHO$ECHO
-ECHO=$ECHO$ECHO$ECHO$ECHO$ECHO$ECHO
-
-AC_MSG_CHECKING([how to print strings])
-# Test print first, because it will be a builtin if present.
-if test "X`( print -r -- -n ) 2>/dev/null`" = X-n && \
-   test "X`print -r -- $ECHO 2>/dev/null`" = "X$ECHO"; then
-  ECHO='print -r --'
-elif test "X`printf %s $ECHO 2>/dev/null`" = "X$ECHO"; then
-  ECHO='printf %s\n'
-else
-  # Use this function as a fallback that always works.
-  func_fallback_echo ()
-  {
-    eval 'cat <<_LTECHO_EOF
-$[]1
-_LTECHO_EOF'
-  }
-  ECHO='func_fallback_echo'
-fi
-
-# func_echo_all arg...
-# Invoke $ECHO with all args, space-separated.
-func_echo_all ()
-{
-    $ECHO "$*" 
-}
-
-case "$ECHO" in
-  printf*) AC_MSG_RESULT([printf]) ;;
-  print*) AC_MSG_RESULT([print -r]) ;;
-  *) AC_MSG_RESULT([cat]) ;;
-esac
-
-m4_ifdef([_AS_DETECT_SUGGESTED],
-[_AS_DETECT_SUGGESTED([
-  test -n "${ZSH_VERSION+set}${BASH_VERSION+set}" || (
-    ECHO='\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\'
-    ECHO=$ECHO$ECHO$ECHO$ECHO$ECHO
-    ECHO=$ECHO$ECHO$ECHO$ECHO$ECHO$ECHO
-    PATH=/empty FPATH=/empty; export PATH FPATH
-    test "X`printf %s $ECHO`" = "X$ECHO" \
-      || test "X`print -r -- $ECHO`" = "X$ECHO" )])])
-
-_LT_DECL([], [SHELL], [1], [Shell to use when invoking shell scripts])
-_LT_DECL([], [ECHO], [1], [An echo program that protects backslashes])
-])# _LT_PROG_ECHO_BACKSLASH
-
-
-# _LT_WITH_SYSROOT
-# ----------------
-AC_DEFUN([_LT_WITH_SYSROOT],
-[AC_MSG_CHECKING([for sysroot])
-AC_ARG_WITH([sysroot],
-[  --with-sysroot[=DIR] Search for dependent libraries within DIR
-                        (or the compiler's sysroot if not specified).],
-[], [with_sysroot=no])
-
-dnl lt_sysroot will always be passed unquoted.  We quote it here
-dnl in case the user passed a directory name.
-lt_sysroot=
-case ${with_sysroot} in #(
- yes)
-   if test "$GCC" = yes; then
-     lt_sysroot=`$CC --print-sysroot 2>/dev/null`
-   fi
-   ;; #(
- /*)
-   lt_sysroot=`echo "$with_sysroot" | sed -e "$sed_quote_subst"`
-   ;; #(
- no|'')
-   ;; #(
- *)
-   AC_MSG_RESULT([${with_sysroot}])
-   AC_MSG_ERROR([The sysroot must be an absolute path.])
-   ;;
-esac
-
- AC_MSG_RESULT([${lt_sysroot:-no}])
-_LT_DECL([], [lt_sysroot], [0], [The root where to search for ]dnl
-[dependent libraries, and in which our libraries should be installed.])])
-
-# _LT_ENABLE_LOCK
-# ---------------
-m4_defun([_LT_ENABLE_LOCK],
-[AC_ARG_ENABLE([libtool-lock],
-  [AS_HELP_STRING([--disable-libtool-lock],
-    [avoid locking (might break parallel builds)])])
-test "x$enable_libtool_lock" != xno && enable_libtool_lock=yes
-
-# Some flags need to be propagated to the compiler or linker for good
-# libtool support.
-case $host in
-ia64-*-hpux*)
-  # Find out which ABI we are using.
-  echo 'int i;' > conftest.$ac_ext
-  if AC_TRY_EVAL(ac_compile); then
-    case `/usr/bin/file conftest.$ac_objext` in
-      *ELF-32*)
-	HPUX_IA64_MODE="32"
-	;;
-      *ELF-64*)
-	HPUX_IA64_MODE="64"
-	;;
-    esac
-  fi
-  rm -rf conftest*
-  ;;
-*-*-irix6*)
-  # Find out which ABI we are using.
-  echo '[#]line '$LINENO' "configure"' > conftest.$ac_ext
-  if AC_TRY_EVAL(ac_compile); then
-    if test "$lt_cv_prog_gnu_ld" = yes; then
-      case `/usr/bin/file conftest.$ac_objext` in
-	*32-bit*)
-	  LD="${LD-ld} -melf32bsmip"
-	  ;;
-	*N32*)
-	  LD="${LD-ld} -melf32bmipn32"
-	  ;;
-	*64-bit*)
-	  LD="${LD-ld} -melf64bmip"
-	;;
-      esac
-    else
-      case `/usr/bin/file conftest.$ac_objext` in
-	*32-bit*)
-	  LD="${LD-ld} -32"
-	  ;;
-	*N32*)
-	  LD="${LD-ld} -n32"
-	  ;;
-	*64-bit*)
-	  LD="${LD-ld} -64"
-	  ;;
-      esac
-    fi
-  fi
-  rm -rf conftest*
-  ;;
-
-x86_64-*kfreebsd*-gnu|x86_64-*linux*|ppc*-*linux*|powerpc*-*linux*| \
-s390*-*linux*|s390*-*tpf*|sparc*-*linux*)
-  # Find out which ABI we are using.
-  echo 'int i;' > conftest.$ac_ext
-  if AC_TRY_EVAL(ac_compile); then
-    case `/usr/bin/file conftest.o` in
-      *32-bit*)
-	case $host in
-	  x86_64-*kfreebsd*-gnu)
-	    LD="${LD-ld} -m elf_i386_fbsd"
-	    ;;
-	  x86_64-*linux*)
-	    LD="${LD-ld} -m elf_i386"
-	    ;;
-	  ppc64-*linux*|powerpc64-*linux*)
-	    LD="${LD-ld} -m elf32ppclinux"
-	    ;;
-	  s390x-*linux*)
-	    LD="${LD-ld} -m elf_s390"
-	    ;;
-	  sparc64-*linux*)
-	    LD="${LD-ld} -m elf32_sparc"
-	    ;;
-	esac
-	;;
-      *64-bit*)
-	case $host in
-	  x86_64-*kfreebsd*-gnu)
-	    LD="${LD-ld} -m elf_x86_64_fbsd"
-	    ;;
-	  x86_64-*linux*)
-	    LD="${LD-ld} -m elf_x86_64"
-	    ;;
-	  ppc*-*linux*|powerpc*-*linux*)
-	    LD="${LD-ld} -m elf64ppc"
-	    ;;
-	  s390*-*linux*|s390*-*tpf*)
-	    LD="${LD-ld} -m elf64_s390"
-	    ;;
-	  sparc*-*linux*)
-	    LD="${LD-ld} -m elf64_sparc"
-	    ;;
-	esac
-	;;
-    esac
-  fi
-  rm -rf conftest*
-  ;;
-
-*-*-sco3.2v5*)
-  # On SCO OpenServer 5, we need -belf to get full-featured binaries.
-  SAVE_CFLAGS="$CFLAGS"
-  CFLAGS="$CFLAGS -belf"
-  AC_CACHE_CHECK([whether the C compiler needs -belf], lt_cv_cc_needs_belf,
-    [AC_LANG_PUSH(C)
-     AC_LINK_IFELSE([AC_LANG_PROGRAM([[]],[[]])],[lt_cv_cc_needs_belf=yes],[lt_cv_cc_needs_belf=no])
-     AC_LANG_POP])
-  if test x"$lt_cv_cc_needs_belf" != x"yes"; then
-    # this is probably gcc 2.8.0, egcs 1.0 or newer; no need for -belf
-    CFLAGS="$SAVE_CFLAGS"
-  fi
-  ;;
-*-*solaris*)
-  # Find out which ABI we are using.
-  echo 'int i;' > conftest.$ac_ext
-  if AC_TRY_EVAL(ac_compile); then
-    case `/usr/bin/file conftest.o` in
-    *64-bit*)
-      case $lt_cv_prog_gnu_ld in
-      yes*)
-        case $host in
-        i?86-*-solaris*)
-          LD="${LD-ld} -m elf_x86_64"
-          ;;
-        sparc*-*-solaris*)
-          LD="${LD-ld} -m elf64_sparc"
-          ;;
-        esac
-        # GNU ld 2.21 introduced _sol2 emulations.  Use them if available.
-        if ${LD-ld} -V | grep _sol2 >/dev/null 2>&1; then
-          LD="${LD-ld}_sol2"
-        fi
-        ;;
-      *)
-	if ${LD-ld} -64 -r -o conftest2.o conftest.o >/dev/null 2>&1; then
-	  LD="${LD-ld} -64"
-	fi
-	;;
-      esac
-      ;;
-    esac
-  fi
-  rm -rf conftest*
-  ;;
-esac
-
-need_locks="$enable_libtool_lock"
-])# _LT_ENABLE_LOCK
-
-
-# _LT_PROG_AR
-# -----------
-m4_defun([_LT_PROG_AR],
-[AC_CHECK_TOOLS(AR, [ar], false)
-: ${AR=ar}
-: ${AR_FLAGS=cru}
-_LT_DECL([], [AR], [1], [The archiver])
-_LT_DECL([], [AR_FLAGS], [1], [Flags to create an archive])
-
-AC_CACHE_CHECK([for archiver @FILE support], [lt_cv_ar_at_file],
-  [lt_cv_ar_at_file=no
-   AC_COMPILE_IFELSE([AC_LANG_PROGRAM],
-     [echo conftest.$ac_objext > conftest.lst
-      lt_ar_try='$AR $AR_FLAGS libconftest.a @conftest.lst >&AS_MESSAGE_LOG_FD'
-      AC_TRY_EVAL([lt_ar_try])
-      if test "$ac_status" -eq 0; then
-	# Ensure the archiver fails upon bogus file names.
-	rm -f conftest.$ac_objext libconftest.a
-	AC_TRY_EVAL([lt_ar_try])
-	if test "$ac_status" -ne 0; then
-          lt_cv_ar_at_file=@
-        fi
-      fi
-      rm -f conftest.* libconftest.a
-     ])
-  ])
-
-if test "x$lt_cv_ar_at_file" = xno; then
-  archiver_list_spec=
-else
-  archiver_list_spec=$lt_cv_ar_at_file
-fi
-_LT_DECL([], [archiver_list_spec], [1],
-  [How to feed a file listing to the archiver])
-])# _LT_PROG_AR
-
-
-# _LT_CMD_OLD_ARCHIVE
-# -------------------
-m4_defun([_LT_CMD_OLD_ARCHIVE],
-[_LT_PROG_AR
-
-AC_CHECK_TOOL(STRIP, strip, :)
-test -z "$STRIP" && STRIP=:
-_LT_DECL([], [STRIP], [1], [A symbol stripping program])
-
-AC_CHECK_TOOL(RANLIB, ranlib, :)
-test -z "$RANLIB" && RANLIB=:
-_LT_DECL([], [RANLIB], [1],
-    [Commands used to install an old-style archive])
-
-# Determine commands to create old-style static archives.
-old_archive_cmds='$AR $AR_FLAGS $oldlib$oldobjs'
-old_postinstall_cmds='chmod 644 $oldlib'
-old_postuninstall_cmds=
-
-if test -n "$RANLIB"; then
-  case $host_os in
-  openbsd*)
-    old_postinstall_cmds="$old_postinstall_cmds~\$RANLIB -t \$tool_oldlib"
-    ;;
-  *)
-    old_postinstall_cmds="$old_postinstall_cmds~\$RANLIB \$tool_oldlib"
-    ;;
-  esac
-  old_archive_cmds="$old_archive_cmds~\$RANLIB \$tool_oldlib"
-fi
-
-case $host_os in
-  darwin*)
-    lock_old_archive_extraction=yes ;;
-  *)
-    lock_old_archive_extraction=no ;;
-esac
-_LT_DECL([], [old_postinstall_cmds], [2])
-_LT_DECL([], [old_postuninstall_cmds], [2])
-_LT_TAGDECL([], [old_archive_cmds], [2],
-    [Commands used to build an old-style archive])
-_LT_DECL([], [lock_old_archive_extraction], [0],
-    [Whether to use a lock for old archive extraction])
-])# _LT_CMD_OLD_ARCHIVE
-
-
-# _LT_COMPILER_OPTION(MESSAGE, VARIABLE-NAME, FLAGS,
-#		[OUTPUT-FILE], [ACTION-SUCCESS], [ACTION-FAILURE])
-# ----------------------------------------------------------------
-# Check whether the given compiler option works
-AC_DEFUN([_LT_COMPILER_OPTION],
-[m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-m4_require([_LT_DECL_SED])dnl
-AC_CACHE_CHECK([$1], [$2],
-  [$2=no
-   m4_if([$4], , [ac_outfile=conftest.$ac_objext], [ac_outfile=$4])
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-   lt_compiler_flag="$3"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   # The option is referenced via a variable to avoid confusing sed.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [[^ ]]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&AS_MESSAGE_LOG_FD)
-   (eval "$lt_compile" 2>conftest.err)
-   ac_status=$?
-   cat conftest.err >&AS_MESSAGE_LOG_FD
-   echo "$as_me:$LINENO: \$? = $ac_status" >&AS_MESSAGE_LOG_FD
-   if (exit $ac_status) && test -s "$ac_outfile"; then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings other than the usual output.
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' >conftest.exp
-     $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-     if test ! -s conftest.er2 || diff conftest.exp conftest.er2 >/dev/null; then
-       $2=yes
-     fi
-   fi
-   $RM conftest*
-])
-
-if test x"[$]$2" = xyes; then
-    m4_if([$5], , :, [$5])
-else
-    m4_if([$6], , :, [$6])
-fi
-])# _LT_COMPILER_OPTION
-
-# Old name:
-AU_ALIAS([AC_LIBTOOL_COMPILER_OPTION], [_LT_COMPILER_OPTION])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_COMPILER_OPTION], [])
-
-
-# _LT_LINKER_OPTION(MESSAGE, VARIABLE-NAME, FLAGS,
-#                  [ACTION-SUCCESS], [ACTION-FAILURE])
-# ----------------------------------------------------
-# Check whether the given linker option works
-AC_DEFUN([_LT_LINKER_OPTION],
-[m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-m4_require([_LT_DECL_SED])dnl
-AC_CACHE_CHECK([$1], [$2],
-  [$2=no
-   save_LDFLAGS="$LDFLAGS"
-   LDFLAGS="$LDFLAGS $3"
-   echo "$lt_simple_link_test_code" > conftest.$ac_ext
-   if (eval $ac_link 2>conftest.err) && test -s conftest$ac_exeext; then
-     # The linker can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     if test -s conftest.err; then
-       # Append any errors to the config.log.
-       cat conftest.err 1>&AS_MESSAGE_LOG_FD
-       $ECHO "$_lt_linker_boilerplate" | $SED '/^$/d' > conftest.exp
-       $SED '/^$/d; /^ *+/d' conftest.err >conftest.er2
-       if diff conftest.exp conftest.er2 >/dev/null; then
-         $2=yes
-       fi
-     else
-       $2=yes
-     fi
-   fi
-   $RM -r conftest*
-   LDFLAGS="$save_LDFLAGS"
-])
-
-if test x"[$]$2" = xyes; then
-    m4_if([$4], , :, [$4])
-else
-    m4_if([$5], , :, [$5])
-fi
-])# _LT_LINKER_OPTION
-
-# Old name:
-AU_ALIAS([AC_LIBTOOL_LINKER_OPTION], [_LT_LINKER_OPTION])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_LINKER_OPTION], [])
-
-
-# LT_CMD_MAX_LEN
-#---------------
-AC_DEFUN([LT_CMD_MAX_LEN],
-[AC_REQUIRE([AC_CANONICAL_HOST])dnl
-# find the maximum length of command line arguments
-AC_MSG_CHECKING([the maximum length of command line arguments])
-AC_CACHE_VAL([lt_cv_sys_max_cmd_len], [dnl
-  i=0
-  teststring="ABCD"
-
-  case $build_os in
-  msdosdjgpp*)
-    # On DJGPP, this test can blow up pretty badly due to problems in libc
-    # (any single argument exceeding 2000 bytes causes a buffer overrun
-    # during glob expansion).  Even if it were fixed, the result of this
-    # check would be larger than it should be.
-    lt_cv_sys_max_cmd_len=12288;    # 12K is about right
-    ;;
-
-  gnu*)
-    # Under GNU Hurd, this test is not required because there is
-    # no limit to the length of command line arguments.
-    # Libtool will interpret -1 as no limit whatsoever
-    lt_cv_sys_max_cmd_len=-1;
-    ;;
-
-  cygwin* | mingw* | cegcc*)
-    # On Win9x/ME, this test blows up -- it succeeds, but takes
-    # about 5 minutes as the teststring grows exponentially.
-    # Worse, since 9x/ME are not pre-emptively multitasking,
-    # you end up with a "frozen" computer, even though with patience
-    # the test eventually succeeds (with a max line length of 256k).
-    # Instead, let's just punt: use the minimum linelength reported by
-    # all of the supported platforms: 8192 (on NT/2K/XP).
-    lt_cv_sys_max_cmd_len=8192;
-    ;;
-
-  mint*)
-    # On MiNT this can take a long time and run out of memory.
-    lt_cv_sys_max_cmd_len=8192;
-    ;;
-
-  amigaos*)
-    # On AmigaOS with pdksh, this test takes hours, literally.
-    # So we just punt and use a minimum line length of 8192.
-    lt_cv_sys_max_cmd_len=8192;
-    ;;
-
-  netbsd* | freebsd* | openbsd* | darwin* | dragonfly*)
-    # This has been around since 386BSD, at least.  Likely further.
-    if test -x /sbin/sysctl; then
-      lt_cv_sys_max_cmd_len=`/sbin/sysctl -n kern.argmax`
-    elif test -x /usr/sbin/sysctl; then
-      lt_cv_sys_max_cmd_len=`/usr/sbin/sysctl -n kern.argmax`
-    else
-      lt_cv_sys_max_cmd_len=65536	# usable default for all BSDs
-    fi
-    # And add a safety zone
-    lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \/ 4`
-    lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \* 3`
-    ;;
-
-  interix*)
-    # We know the value 262144 and hardcode it with a safety zone (like BSD)
-    lt_cv_sys_max_cmd_len=196608
-    ;;
-
-  os2*)
-    # The test takes a long time on OS/2.
-    lt_cv_sys_max_cmd_len=8192
-    ;;
-
-  osf*)
-    # Dr. Hans Ekkehard Plesser reports seeing a kernel panic running configure
-    # due to this test when exec_disable_arg_limit is 1 on Tru64. It is not
-    # nice to cause kernel panics so lets avoid the loop below.
-    # First set a reasonable default.
-    lt_cv_sys_max_cmd_len=16384
-    #
-    if test -x /sbin/sysconfig; then
-      case `/sbin/sysconfig -q proc exec_disable_arg_limit` in
-        *1*) lt_cv_sys_max_cmd_len=-1 ;;
-      esac
-    fi
-    ;;
-  sco3.2v5*)
-    lt_cv_sys_max_cmd_len=102400
-    ;;
-  sysv5* | sco5v6* | sysv4.2uw2*)
-    kargmax=`grep ARG_MAX /etc/conf/cf.d/stune 2>/dev/null`
-    if test -n "$kargmax"; then
-      lt_cv_sys_max_cmd_len=`echo $kargmax | sed 's/.*[[	 ]]//'`
-    else
-      lt_cv_sys_max_cmd_len=32768
-    fi
-    ;;
-  *)
-    lt_cv_sys_max_cmd_len=`(getconf ARG_MAX) 2> /dev/null`
-    if test -n "$lt_cv_sys_max_cmd_len"; then
-      lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \/ 4`
-      lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \* 3`
-    else
-      # Make teststring a little bigger before we do anything with it.
-      # a 1K string should be a reasonable start.
-      for i in 1 2 3 4 5 6 7 8 ; do
-        teststring=$teststring$teststring
-      done
-      SHELL=${SHELL-${CONFIG_SHELL-/bin/sh}}
-      # If test is not a shell built-in, we'll probably end up computing a
-      # maximum length that is only half of the actual maximum length, but
-      # we can't tell.
-      while { test "X"`env echo "$teststring$teststring" 2>/dev/null` \
-	         = "X$teststring$teststring"; } >/dev/null 2>&1 &&
-	      test $i != 17 # 1/2 MB should be enough
-      do
-        i=`expr $i + 1`
-        teststring=$teststring$teststring
-      done
-      # Only check the string length outside the loop.
-      lt_cv_sys_max_cmd_len=`expr "X$teststring" : ".*" 2>&1`
-      teststring=
-      # Add a significant safety factor because C++ compilers can tack on
-      # massive amounts of additional arguments before passing them to the
-      # linker.  It appears as though 1/2 is a usable value.
-      lt_cv_sys_max_cmd_len=`expr $lt_cv_sys_max_cmd_len \/ 2`
-    fi
-    ;;
-  esac
-])
-if test -n $lt_cv_sys_max_cmd_len ; then
-  AC_MSG_RESULT($lt_cv_sys_max_cmd_len)
-else
-  AC_MSG_RESULT(none)
-fi
-max_cmd_len=$lt_cv_sys_max_cmd_len
-_LT_DECL([], [max_cmd_len], [0],
-    [What is the maximum length of a command?])
-])# LT_CMD_MAX_LEN
-
-# Old name:
-AU_ALIAS([AC_LIBTOOL_SYS_MAX_CMD_LEN], [LT_CMD_MAX_LEN])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_SYS_MAX_CMD_LEN], [])
-
-
-# _LT_HEADER_DLFCN
-# ----------------
-m4_defun([_LT_HEADER_DLFCN],
-[AC_CHECK_HEADERS([dlfcn.h], [], [], [AC_INCLUDES_DEFAULT])dnl
-])# _LT_HEADER_DLFCN
-
-
-# _LT_TRY_DLOPEN_SELF (ACTION-IF-TRUE, ACTION-IF-TRUE-W-USCORE,
-#                      ACTION-IF-FALSE, ACTION-IF-CROSS-COMPILING)
-# ----------------------------------------------------------------
-m4_defun([_LT_TRY_DLOPEN_SELF],
-[m4_require([_LT_HEADER_DLFCN])dnl
-if test "$cross_compiling" = yes; then :
-  [$4]
-else
-  lt_dlunknown=0; lt_dlno_uscore=1; lt_dlneed_uscore=2
-  lt_status=$lt_dlunknown
-  cat > conftest.$ac_ext <<_LT_EOF
-[#line $LINENO "configure"
-#include "confdefs.h"
-
-#if HAVE_DLFCN_H
-#include <dlfcn.h>
-#endif
-
-#include <stdio.h>
-
-#ifdef RTLD_GLOBAL
-#  define LT_DLGLOBAL		RTLD_GLOBAL
-#else
-#  ifdef DL_GLOBAL
-#    define LT_DLGLOBAL		DL_GLOBAL
-#  else
-#    define LT_DLGLOBAL		0
-#  endif
-#endif
-
-/* We may have to define LT_DLLAZY_OR_NOW in the command line if we
-   find out it does not work in some platform. */
-#ifndef LT_DLLAZY_OR_NOW
-#  ifdef RTLD_LAZY
-#    define LT_DLLAZY_OR_NOW		RTLD_LAZY
-#  else
-#    ifdef DL_LAZY
-#      define LT_DLLAZY_OR_NOW		DL_LAZY
-#    else
-#      ifdef RTLD_NOW
-#        define LT_DLLAZY_OR_NOW	RTLD_NOW
-#      else
-#        ifdef DL_NOW
-#          define LT_DLLAZY_OR_NOW	DL_NOW
-#        else
-#          define LT_DLLAZY_OR_NOW	0
-#        endif
-#      endif
-#    endif
-#  endif
-#endif
-
-/* When -fvisbility=hidden is used, assume the code has been annotated
-   correspondingly for the symbols needed.  */
-#if defined(__GNUC__) && (((__GNUC__ == 3) && (__GNUC_MINOR__ >= 3)) || (__GNUC__ > 3))
-int fnord () __attribute__((visibility("default")));
-#endif
-
-int fnord () { return 42; }
-int main ()
-{
-  void *self = dlopen (0, LT_DLGLOBAL|LT_DLLAZY_OR_NOW);
-  int status = $lt_dlunknown;
-
-  if (self)
-    {
-      if (dlsym (self,"fnord"))       status = $lt_dlno_uscore;
-      else
-        {
-	  if (dlsym( self,"_fnord"))  status = $lt_dlneed_uscore;
-          else puts (dlerror ());
-	}
-      /* dlclose (self); */
-    }
-  else
-    puts (dlerror ());
-
-  return status;
-}]
-_LT_EOF
-  if AC_TRY_EVAL(ac_link) && test -s conftest${ac_exeext} 2>/dev/null; then
-    (./conftest; exit; ) >&AS_MESSAGE_LOG_FD 2>/dev/null
-    lt_status=$?
-    case x$lt_status in
-      x$lt_dlno_uscore) $1 ;;
-      x$lt_dlneed_uscore) $2 ;;
-      x$lt_dlunknown|x*) $3 ;;
-    esac
-  else :
-    # compilation failed
-    $3
-  fi
-fi
-rm -fr conftest*
-])# _LT_TRY_DLOPEN_SELF
-
-
-# LT_SYS_DLOPEN_SELF
-# ------------------
-AC_DEFUN([LT_SYS_DLOPEN_SELF],
-[m4_require([_LT_HEADER_DLFCN])dnl
-if test "x$enable_dlopen" != xyes; then
-  enable_dlopen=unknown
-  enable_dlopen_self=unknown
-  enable_dlopen_self_static=unknown
-else
-  lt_cv_dlopen=no
-  lt_cv_dlopen_libs=
-
-  case $host_os in
-  beos*)
-    lt_cv_dlopen="load_add_on"
-    lt_cv_dlopen_libs=
-    lt_cv_dlopen_self=yes
-    ;;
-
-  mingw* | pw32* | cegcc*)
-    lt_cv_dlopen="LoadLibrary"
-    lt_cv_dlopen_libs=
-    ;;
-
-  cygwin*)
-    lt_cv_dlopen="dlopen"
-    lt_cv_dlopen_libs=
-    ;;
-
-  darwin*)
-  # if libdl is installed we need to link against it
-    AC_CHECK_LIB([dl], [dlopen],
-		[lt_cv_dlopen="dlopen" lt_cv_dlopen_libs="-ldl"],[
-    lt_cv_dlopen="dyld"
-    lt_cv_dlopen_libs=
-    lt_cv_dlopen_self=yes
-    ])
-    ;;
-
-  *)
-    AC_CHECK_FUNC([shl_load],
-	  [lt_cv_dlopen="shl_load"],
-      [AC_CHECK_LIB([dld], [shl_load],
-	    [lt_cv_dlopen="shl_load" lt_cv_dlopen_libs="-ldld"],
-	[AC_CHECK_FUNC([dlopen],
-	      [lt_cv_dlopen="dlopen"],
-	  [AC_CHECK_LIB([dl], [dlopen],
-		[lt_cv_dlopen="dlopen" lt_cv_dlopen_libs="-ldl"],
-	    [AC_CHECK_LIB([svld], [dlopen],
-		  [lt_cv_dlopen="dlopen" lt_cv_dlopen_libs="-lsvld"],
-	      [AC_CHECK_LIB([dld], [dld_link],
-		    [lt_cv_dlopen="dld_link" lt_cv_dlopen_libs="-ldld"])
-	      ])
-	    ])
-	  ])
-	])
-      ])
-    ;;
-  esac
-
-  if test "x$lt_cv_dlopen" != xno; then
-    enable_dlopen=yes
-  else
-    enable_dlopen=no
-  fi
-
-  case $lt_cv_dlopen in
-  dlopen)
-    save_CPPFLAGS="$CPPFLAGS"
-    test "x$ac_cv_header_dlfcn_h" = xyes && CPPFLAGS="$CPPFLAGS -DHAVE_DLFCN_H"
-
-    save_LDFLAGS="$LDFLAGS"
-    wl=$lt_prog_compiler_wl eval LDFLAGS=\"\$LDFLAGS $export_dynamic_flag_spec\"
-
-    save_LIBS="$LIBS"
-    LIBS="$lt_cv_dlopen_libs $LIBS"
-
-    AC_CACHE_CHECK([whether a program can dlopen itself],
-	  lt_cv_dlopen_self, [dnl
-	  _LT_TRY_DLOPEN_SELF(
-	    lt_cv_dlopen_self=yes, lt_cv_dlopen_self=yes,
-	    lt_cv_dlopen_self=no, lt_cv_dlopen_self=cross)
-    ])
-
-    if test "x$lt_cv_dlopen_self" = xyes; then
-      wl=$lt_prog_compiler_wl eval LDFLAGS=\"\$LDFLAGS $lt_prog_compiler_static\"
-      AC_CACHE_CHECK([whether a statically linked program can dlopen itself],
-	  lt_cv_dlopen_self_static, [dnl
-	  _LT_TRY_DLOPEN_SELF(
-	    lt_cv_dlopen_self_static=yes, lt_cv_dlopen_self_static=yes,
-	    lt_cv_dlopen_self_static=no,  lt_cv_dlopen_self_static=cross)
-      ])
-    fi
-
-    CPPFLAGS="$save_CPPFLAGS"
-    LDFLAGS="$save_LDFLAGS"
-    LIBS="$save_LIBS"
-    ;;
-  esac
-
-  case $lt_cv_dlopen_self in
-  yes|no) enable_dlopen_self=$lt_cv_dlopen_self ;;
-  *) enable_dlopen_self=unknown ;;
-  esac
-
-  case $lt_cv_dlopen_self_static in
-  yes|no) enable_dlopen_self_static=$lt_cv_dlopen_self_static ;;
-  *) enable_dlopen_self_static=unknown ;;
-  esac
-fi
-_LT_DECL([dlopen_support], [enable_dlopen], [0],
-	 [Whether dlopen is supported])
-_LT_DECL([dlopen_self], [enable_dlopen_self], [0],
-	 [Whether dlopen of programs is supported])
-_LT_DECL([dlopen_self_static], [enable_dlopen_self_static], [0],
-	 [Whether dlopen of statically linked programs is supported])
-])# LT_SYS_DLOPEN_SELF
-
-# Old name:
-AU_ALIAS([AC_LIBTOOL_DLOPEN_SELF], [LT_SYS_DLOPEN_SELF])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_DLOPEN_SELF], [])
-
-
-# _LT_COMPILER_C_O([TAGNAME])
-# ---------------------------
-# Check to see if options -c and -o are simultaneously supported by compiler.
-# This macro does not hard code the compiler like AC_PROG_CC_C_O.
-m4_defun([_LT_COMPILER_C_O],
-[m4_require([_LT_DECL_SED])dnl
-m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-m4_require([_LT_TAG_COMPILER])dnl
-AC_CACHE_CHECK([if $compiler supports -c -o file.$ac_objext],
-  [_LT_TAGVAR(lt_cv_prog_compiler_c_o, $1)],
-  [_LT_TAGVAR(lt_cv_prog_compiler_c_o, $1)=no
-   $RM -r conftest 2>/dev/null
-   mkdir conftest
-   cd conftest
-   mkdir out
-   echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-   lt_compiler_flag="-o out/conftest2.$ac_objext"
-   # Insert the option either (1) after the last *FLAGS variable, or
-   # (2) before a word containing "conftest.", or (3) at the end.
-   # Note that $ac_compile itself does not contain backslashes and begins
-   # with a dollar sign (not a hyphen), so the echo should work correctly.
-   lt_compile=`echo "$ac_compile" | $SED \
-   -e 's:.*FLAGS}\{0,1\} :&$lt_compiler_flag :; t' \
-   -e 's: [[^ ]]*conftest\.: $lt_compiler_flag&:; t' \
-   -e 's:$: $lt_compiler_flag:'`
-   (eval echo "\"\$as_me:$LINENO: $lt_compile\"" >&AS_MESSAGE_LOG_FD)
-   (eval "$lt_compile" 2>out/conftest.err)
-   ac_status=$?
-   cat out/conftest.err >&AS_MESSAGE_LOG_FD
-   echo "$as_me:$LINENO: \$? = $ac_status" >&AS_MESSAGE_LOG_FD
-   if (exit $ac_status) && test -s out/conftest2.$ac_objext
-   then
-     # The compiler can only warn and ignore the option if not recognized
-     # So say no if there are warnings
-     $ECHO "$_lt_compiler_boilerplate" | $SED '/^$/d' > out/conftest.exp
-     $SED '/^$/d; /^ *+/d' out/conftest.err >out/conftest.er2
-     if test ! -s out/conftest.er2 || diff out/conftest.exp out/conftest.er2 >/dev/null; then
-       _LT_TAGVAR(lt_cv_prog_compiler_c_o, $1)=yes
-     fi
-   fi
-   chmod u+w . 2>&AS_MESSAGE_LOG_FD
-   $RM conftest*
-   # SGI C++ compiler will create directory out/ii_files/ for
-   # template instantiation
-   test -d out/ii_files && $RM out/ii_files/* && rmdir out/ii_files
-   $RM out/* && rmdir out
-   cd ..
-   $RM -r conftest
-   $RM conftest*
-])
-_LT_TAGDECL([compiler_c_o], [lt_cv_prog_compiler_c_o], [1],
-	[Does compiler simultaneously support -c and -o options?])
-])# _LT_COMPILER_C_O
-
-
-# _LT_COMPILER_FILE_LOCKS([TAGNAME])
-# ----------------------------------
-# Check to see if we can do hard links to lock some files if needed
-m4_defun([_LT_COMPILER_FILE_LOCKS],
-[m4_require([_LT_ENABLE_LOCK])dnl
-m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-_LT_COMPILER_C_O([$1])
-
-hard_links="nottested"
-if test "$_LT_TAGVAR(lt_cv_prog_compiler_c_o, $1)" = no && test "$need_locks" != no; then
-  # do not overwrite the value of need_locks provided by the user
-  AC_MSG_CHECKING([if we can lock with hard links])
-  hard_links=yes
-  $RM conftest*
-  ln conftest.a conftest.b 2>/dev/null && hard_links=no
-  touch conftest.a
-  ln conftest.a conftest.b 2>&5 || hard_links=no
-  ln conftest.a conftest.b 2>/dev/null && hard_links=no
-  AC_MSG_RESULT([$hard_links])
-  if test "$hard_links" = no; then
-    AC_MSG_WARN([`$CC' does not support `-c -o', so `make -j' may be unsafe])
-    need_locks=warn
-  fi
-else
-  need_locks=no
-fi
-_LT_DECL([], [need_locks], [1], [Must we lock files when doing compilation?])
-])# _LT_COMPILER_FILE_LOCKS
-
-
-# _LT_CHECK_OBJDIR
-# ----------------
-m4_defun([_LT_CHECK_OBJDIR],
-[AC_CACHE_CHECK([for objdir], [lt_cv_objdir],
-[rm -f .libs 2>/dev/null
-mkdir .libs 2>/dev/null
-if test -d .libs; then
-  lt_cv_objdir=.libs
-else
-  # MS-DOS does not allow filenames that begin with a dot.
-  lt_cv_objdir=_libs
-fi
-rmdir .libs 2>/dev/null])
-objdir=$lt_cv_objdir
-_LT_DECL([], [objdir], [0],
-         [The name of the directory that contains temporary libtool files])dnl
-m4_pattern_allow([LT_OBJDIR])dnl
-AC_DEFINE_UNQUOTED(LT_OBJDIR, "$lt_cv_objdir/",
-  [Define to the sub-directory in which libtool stores uninstalled libraries.])
-])# _LT_CHECK_OBJDIR
-
-
-# _LT_LINKER_HARDCODE_LIBPATH([TAGNAME])
-# --------------------------------------
-# Check hardcoding attributes.
-m4_defun([_LT_LINKER_HARDCODE_LIBPATH],
-[AC_MSG_CHECKING([how to hardcode library paths into programs])
-_LT_TAGVAR(hardcode_action, $1)=
-if test -n "$_LT_TAGVAR(hardcode_libdir_flag_spec, $1)" ||
-   test -n "$_LT_TAGVAR(runpath_var, $1)" ||
-   test "X$_LT_TAGVAR(hardcode_automatic, $1)" = "Xyes" ; then
-
-  # We can hardcode non-existent directories.
-  if test "$_LT_TAGVAR(hardcode_direct, $1)" != no &&
-     # If the only mechanism to avoid hardcoding is shlibpath_var, we
-     # have to relink, otherwise we might link with an installed library
-     # when we should be linking with a yet-to-be-installed one
-     ## test "$_LT_TAGVAR(hardcode_shlibpath_var, $1)" != no &&
-     test "$_LT_TAGVAR(hardcode_minus_L, $1)" != no; then
-    # Linking always hardcodes the temporary library directory.
-    _LT_TAGVAR(hardcode_action, $1)=relink
-  else
-    # We can link without hardcoding, and we can hardcode nonexisting dirs.
-    _LT_TAGVAR(hardcode_action, $1)=immediate
-  fi
-else
-  # We cannot hardcode anything, or else we can only hardcode existing
-  # directories.
-  _LT_TAGVAR(hardcode_action, $1)=unsupported
-fi
-AC_MSG_RESULT([$_LT_TAGVAR(hardcode_action, $1)])
-
-if test "$_LT_TAGVAR(hardcode_action, $1)" = relink ||
-   test "$_LT_TAGVAR(inherit_rpath, $1)" = yes; then
-  # Fast installation is not supported
-  enable_fast_install=no
-elif test "$shlibpath_overrides_runpath" = yes ||
-     test "$enable_shared" = no; then
-  # Fast installation is not necessary
-  enable_fast_install=needless
-fi
-_LT_TAGDECL([], [hardcode_action], [0],
-    [How to hardcode a shared library path into an executable])
-])# _LT_LINKER_HARDCODE_LIBPATH
-
-
-# _LT_CMD_STRIPLIB
-# ----------------
-m4_defun([_LT_CMD_STRIPLIB],
-[m4_require([_LT_DECL_EGREP])
-striplib=
-old_striplib=
-AC_MSG_CHECKING([whether stripping libraries is possible])
-if test -n "$STRIP" && $STRIP -V 2>&1 | $GREP "GNU strip" >/dev/null; then
-  test -z "$old_striplib" && old_striplib="$STRIP --strip-debug"
-  test -z "$striplib" && striplib="$STRIP --strip-unneeded"
-  AC_MSG_RESULT([yes])
-else
-# FIXME - insert some real tests, host_os isn't really good enough
-  case $host_os in
-  darwin*)
-    if test -n "$STRIP" ; then
-      striplib="$STRIP -x"
-      old_striplib="$STRIP -S"
-      AC_MSG_RESULT([yes])
-    else
-      AC_MSG_RESULT([no])
-    fi
-    ;;
-  *)
-    AC_MSG_RESULT([no])
-    ;;
-  esac
-fi
-_LT_DECL([], [old_striplib], [1], [Commands to strip libraries])
-_LT_DECL([], [striplib], [1])
-])# _LT_CMD_STRIPLIB
-
-
-# _LT_SYS_DYNAMIC_LINKER([TAG])
-# -----------------------------
-# PORTME Fill in your ld.so characteristics
-m4_defun([_LT_SYS_DYNAMIC_LINKER],
-[AC_REQUIRE([AC_CANONICAL_HOST])dnl
-m4_require([_LT_DECL_EGREP])dnl
-m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-m4_require([_LT_DECL_OBJDUMP])dnl
-m4_require([_LT_DECL_SED])dnl
-m4_require([_LT_CHECK_SHELL_FEATURES])dnl
-AC_MSG_CHECKING([dynamic linker characteristics])
-m4_if([$1],
-	[], [
-if test "$GCC" = yes; then
-  case $host_os in
-    darwin*) lt_awk_arg="/^libraries:/,/LR/" ;;
-    *) lt_awk_arg="/^libraries:/" ;;
-  esac
-  case $host_os in
-    mingw* | cegcc*) lt_sed_strip_eq="s,=\([[A-Za-z]]:\),\1,g" ;;
-    *) lt_sed_strip_eq="s,=/,/,g" ;;
-  esac
-  lt_search_path_spec=`$CC -print-search-dirs | awk $lt_awk_arg | $SED -e "s/^libraries://" -e $lt_sed_strip_eq`
-  case $lt_search_path_spec in
-  *\;*)
-    # if the path contains ";" then we assume it to be the separator
-    # otherwise default to the standard path separator (i.e. ":") - it is
-    # assumed that no part of a normal pathname contains ";" but that should
-    # okay in the real world where ";" in dirpaths is itself problematic.
-    lt_search_path_spec=`$ECHO "$lt_search_path_spec" | $SED 's/;/ /g'`
-    ;;
-  *)
-    lt_search_path_spec=`$ECHO "$lt_search_path_spec" | $SED "s/$PATH_SEPARATOR/ /g"`
-    ;;
-  esac
-  # Ok, now we have the path, separated by spaces, we can step through it
-  # and add multilib dir if necessary.
-  lt_tmp_lt_search_path_spec=
-  lt_multi_os_dir=`$CC $CPPFLAGS $CFLAGS $LDFLAGS -print-multi-os-directory 2>/dev/null`
-  for lt_sys_path in $lt_search_path_spec; do
-    if test -d "$lt_sys_path/$lt_multi_os_dir"; then
-      lt_tmp_lt_search_path_spec="$lt_tmp_lt_search_path_spec $lt_sys_path/$lt_multi_os_dir"
-    else
-      test -d "$lt_sys_path" && \
-	lt_tmp_lt_search_path_spec="$lt_tmp_lt_search_path_spec $lt_sys_path"
-    fi
-  done
-  lt_search_path_spec=`$ECHO "$lt_tmp_lt_search_path_spec" | awk '
-BEGIN {RS=" "; FS="/|\n";} {
-  lt_foo="";
-  lt_count=0;
-  for (lt_i = NF; lt_i > 0; lt_i--) {
-    if ($lt_i != "" && $lt_i != ".") {
-      if ($lt_i == "..") {
-        lt_count++;
-      } else {
-        if (lt_count == 0) {
-          lt_foo="/" $lt_i lt_foo;
-        } else {
-          lt_count--;
-        }
-      }
-    }
-  }
-  if (lt_foo != "") { lt_freq[[lt_foo]]++; }
-  if (lt_freq[[lt_foo]] == 1) { print lt_foo; }
-}'`
-  # AWK program above erroneously prepends '/' to C:/dos/paths
-  # for these hosts.
-  case $host_os in
-    mingw* | cegcc*) lt_search_path_spec=`$ECHO "$lt_search_path_spec" |\
-      $SED 's,/\([[A-Za-z]]:\),\1,g'` ;;
-  esac
-  sys_lib_search_path_spec=`$ECHO "$lt_search_path_spec" | $lt_NL2SP`
-else
-  sys_lib_search_path_spec="/lib /usr/lib /usr/local/lib"
-fi])
-library_names_spec=
-libname_spec='lib$name'
-soname_spec=
-shrext_cmds=".so"
-postinstall_cmds=
-postuninstall_cmds=
-finish_cmds=
-finish_eval=
-shlibpath_var=
-shlibpath_overrides_runpath=unknown
-version_type=none
-dynamic_linker="$host_os ld.so"
-sys_lib_dlsearch_path_spec="/lib /usr/lib"
-need_lib_prefix=unknown
-hardcode_into_libs=no
-
-# when you set need_version to no, make sure it does not cause -set_version
-# flags to be left without arguments
-need_version=unknown
-
-case $host_os in
-aix3*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix $libname.a'
-  shlibpath_var=LIBPATH
-
-  # AIX 3 has no versioning support, so we append a major version to the name.
-  soname_spec='${libname}${release}${shared_ext}$major'
-  ;;
-
-aix[[4-9]]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  hardcode_into_libs=yes
-  if test "$host_cpu" = ia64; then
-    # AIX 5 supports IA64
-    library_names_spec='${libname}${release}${shared_ext}$major ${libname}${release}${shared_ext}$versuffix $libname${shared_ext}'
-    shlibpath_var=LD_LIBRARY_PATH
-  else
-    # With GCC up to 2.95.x, collect2 would create an import file
-    # for dependence libraries.  The import file would start with
-    # the line `#! .'.  This would cause the generated library to
-    # depend on `.', always an invalid library.  This was fixed in
-    # development snapshots of GCC prior to 3.0.
-    case $host_os in
-      aix4 | aix4.[[01]] | aix4.[[01]].*)
-      if { echo '#if __GNUC__ > 2 || (__GNUC__ == 2 && __GNUC_MINOR__ >= 97)'
-	   echo ' yes '
-	   echo '#endif'; } | ${CC} -E - | $GREP yes > /dev/null; then
-	:
-      else
-	can_build_shared=no
-      fi
-      ;;
-    esac
-    # AIX (on Power*) has no versioning support, so currently we can not hardcode correct
-    # soname into executable. Probably we can add versioning support to
-    # collect2, so additional links can be useful in future.
-    if test "$aix_use_runtimelinking" = yes; then
-      # If using run time linking (on AIX 4.2 or later) use lib<name>.so
-      # instead of lib<name>.a to let people know that these are not
-      # typical AIX shared libraries.
-      library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    else
-      # We preserve .a as extension for shared libraries through AIX4.2
-      # and later when we are not doing run time linking.
-      library_names_spec='${libname}${release}.a $libname.a'
-      soname_spec='${libname}${release}${shared_ext}$major'
-    fi
-    shlibpath_var=LIBPATH
-  fi
-  ;;
-
-amigaos*)
-  case $host_cpu in
-  powerpc)
-    # Since July 2007 AmigaOS4 officially supports .so libraries.
-    # When compiling the executable, add -use-dynld -Lsobjs: to the compileline.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    ;;
-  m68k)
-    library_names_spec='$libname.ixlibrary $libname.a'
-    # Create ${libname}_ixlibrary.a entries in /sys/libs.
-    finish_eval='for lib in `ls $libdir/*.ixlibrary 2>/dev/null`; do libname=`func_echo_all "$lib" | $SED '\''s%^.*/\([[^/]]*\)\.ixlibrary$%\1%'\''`; test $RM /sys/libs/${libname}_ixlibrary.a; $show "cd /sys/libs && $LN_S $lib ${libname}_ixlibrary.a"; cd /sys/libs && $LN_S $lib ${libname}_ixlibrary.a || exit 1; done'
-    ;;
-  esac
-  ;;
-
-beos*)
-  library_names_spec='${libname}${shared_ext}'
-  dynamic_linker="$host_os ld.so"
-  shlibpath_var=LIBRARY_PATH
-  ;;
-
-bsdi[[45]]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  sys_lib_search_path_spec="/shlib /usr/lib /usr/X11/lib /usr/contrib/lib /lib /usr/local/lib"
-  sys_lib_dlsearch_path_spec="/shlib /usr/lib /usr/local/lib"
-  # the default ld.so.conf also contains /usr/contrib/lib and
-  # /usr/X11R6/lib (/usr/X11 is a link to /usr/X11R6), but let us allow
-  # libtool to hard-code these into programs
-  ;;
-
-cygwin* | mingw* | pw32* | cegcc*)
-  version_type=windows
-  shrext_cmds=".dll"
-  need_version=no
-  need_lib_prefix=no
-
-  case $GCC,$cc_basename in
-  yes,*)
-    # gcc
-    library_names_spec='$libname.dll.a'
-    # DLL is installed to $(libdir)/../bin by postinstall_cmds
-    postinstall_cmds='base_file=`basename \${file}`~
-      dlpath=`$SHELL 2>&1 -c '\''. $dir/'\''\${base_file}'\''i; echo \$dlname'\''`~
-      dldir=$destdir/`dirname \$dlpath`~
-      test -d \$dldir || mkdir -p \$dldir~
-      $install_prog $dir/$dlname \$dldir/$dlname~
-      chmod a+x \$dldir/$dlname~
-      if test -n '\''$stripme'\'' && test -n '\''$striplib'\''; then
-        eval '\''$striplib \$dldir/$dlname'\'' || exit \$?;
-      fi'
-    postuninstall_cmds='dldll=`$SHELL 2>&1 -c '\''. $file; echo \$dlname'\''`~
-      dlpath=$dir/\$dldll~
-       $RM \$dlpath'
-    shlibpath_overrides_runpath=yes
-
-    case $host_os in
-    cygwin*)
-      # Cygwin DLLs use 'cyg' prefix rather than 'lib'
-      soname_spec='`echo ${libname} | sed -e 's/^lib/cyg/'``echo ${release} | $SED -e 's/[[.]]/-/g'`${versuffix}${shared_ext}'
-m4_if([$1], [],[
-      sys_lib_search_path_spec="$sys_lib_search_path_spec /usr/lib/w32api"])
-      ;;
-    mingw* | cegcc*)
-      # MinGW DLLs use traditional 'lib' prefix
-      soname_spec='${libname}`echo ${release} | $SED -e 's/[[.]]/-/g'`${versuffix}${shared_ext}'
-      ;;
-    pw32*)
-      # pw32 DLLs use 'pw' prefix rather than 'lib'
-      library_names_spec='`echo ${libname} | sed -e 's/^lib/pw/'``echo ${release} | $SED -e 's/[[.]]/-/g'`${versuffix}${shared_ext}'
-      ;;
-    esac
-    dynamic_linker='Win32 ld.exe'
-    ;;
-
-  *,cl*)
-    # Native MSVC
-    libname_spec='$name'
-    soname_spec='${libname}`echo ${release} | $SED -e 's/[[.]]/-/g'`${versuffix}${shared_ext}'
-    library_names_spec='${libname}.dll.lib'
-
-    case $build_os in
-    mingw*)
-      sys_lib_search_path_spec=
-      lt_save_ifs=$IFS
-      IFS=';'
-      for lt_path in $LIB
-      do
-        IFS=$lt_save_ifs
-        # Let DOS variable expansion print the short 8.3 style file name.
-        lt_path=`cd "$lt_path" 2>/dev/null && cmd //C "for %i in (".") do @echo %~si"`
-        sys_lib_search_path_spec="$sys_lib_search_path_spec $lt_path"
-      done
-      IFS=$lt_save_ifs
-      # Convert to MSYS style.
-      sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | sed -e 's|\\\\|/|g' -e 's| \\([[a-zA-Z]]\\):| /\\1|g' -e 's|^ ||'`
-      ;;
-    cygwin*)
-      # Convert to unix form, then to dos form, then back to unix form
-      # but this time dos style (no spaces!) so that the unix form looks
-      # like /cygdrive/c/PROGRA~1:/cygdr...
-      sys_lib_search_path_spec=`cygpath --path --unix "$LIB"`
-      sys_lib_search_path_spec=`cygpath --path --dos "$sys_lib_search_path_spec" 2>/dev/null`
-      sys_lib_search_path_spec=`cygpath --path --unix "$sys_lib_search_path_spec" | $SED -e "s/$PATH_SEPARATOR/ /g"`
-      ;;
-    *)
-      sys_lib_search_path_spec="$LIB"
-      if $ECHO "$sys_lib_search_path_spec" | [$GREP ';[c-zC-Z]:/' >/dev/null]; then
-        # It is most probably a Windows format PATH.
-        sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | $SED -e 's/;/ /g'`
-      else
-        sys_lib_search_path_spec=`$ECHO "$sys_lib_search_path_spec" | $SED -e "s/$PATH_SEPARATOR/ /g"`
-      fi
-      # FIXME: find the short name or the path components, as spaces are
-      # common. (e.g. "Program Files" -> "PROGRA~1")
-      ;;
-    esac
-
-    # DLL is installed to $(libdir)/../bin by postinstall_cmds
-    postinstall_cmds='base_file=`basename \${file}`~
-      dlpath=`$SHELL 2>&1 -c '\''. $dir/'\''\${base_file}'\''i; echo \$dlname'\''`~
-      dldir=$destdir/`dirname \$dlpath`~
-      test -d \$dldir || mkdir -p \$dldir~
-      $install_prog $dir/$dlname \$dldir/$dlname'
-    postuninstall_cmds='dldll=`$SHELL 2>&1 -c '\''. $file; echo \$dlname'\''`~
-      dlpath=$dir/\$dldll~
-       $RM \$dlpath'
-    shlibpath_overrides_runpath=yes
-    dynamic_linker='Win32 link.exe'
-    ;;
-
-  *)
-    # Assume MSVC wrapper
-    library_names_spec='${libname}`echo ${release} | $SED -e 's/[[.]]/-/g'`${versuffix}${shared_ext} $libname.lib'
-    dynamic_linker='Win32 ld.exe'
-    ;;
-  esac
-  # FIXME: first we should search . and the directory the executable is in
-  shlibpath_var=PATH
-  ;;
-
-darwin* | rhapsody*)
-  dynamic_linker="$host_os dyld"
-  version_type=darwin
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${major}$shared_ext ${libname}$shared_ext'
-  soname_spec='${libname}${release}${major}$shared_ext'
-  shlibpath_overrides_runpath=yes
-  shlibpath_var=DYLD_LIBRARY_PATH
-  shrext_cmds='`test .$module = .yes && echo .so || echo .dylib`'
-m4_if([$1], [],[
-  sys_lib_search_path_spec="$sys_lib_search_path_spec /usr/local/lib"])
-  sys_lib_dlsearch_path_spec='/usr/local/lib /lib /usr/lib'
-  ;;
-
-dgux*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname$shared_ext'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  ;;
-
-freebsd* | dragonfly*)
-  # DragonFly does not have aout.  When/if they implement a new
-  # versioning mechanism, adjust this.
-  if test -x /usr/bin/objformat; then
-    objformat=`/usr/bin/objformat`
-  else
-    case $host_os in
-    freebsd[[23]].*) objformat=aout ;;
-    *) objformat=elf ;;
-    esac
-  fi
-  version_type=freebsd-$objformat
-  case $version_type in
-    freebsd-elf*)
-      library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext} $libname${shared_ext}'
-      need_version=no
-      need_lib_prefix=no
-      ;;
-    freebsd-*)
-      library_names_spec='${libname}${release}${shared_ext}$versuffix $libname${shared_ext}$versuffix'
-      need_version=yes
-      ;;
-  esac
-  shlibpath_var=LD_LIBRARY_PATH
-  case $host_os in
-  freebsd2.*)
-    shlibpath_overrides_runpath=yes
-    ;;
-  freebsd3.[[01]]* | freebsdelf3.[[01]]*)
-    shlibpath_overrides_runpath=yes
-    hardcode_into_libs=yes
-    ;;
-  freebsd3.[[2-9]]* | freebsdelf3.[[2-9]]* | \
-  freebsd4.[[0-5]] | freebsdelf4.[[0-5]] | freebsd4.1.1 | freebsdelf4.1.1)
-    shlibpath_overrides_runpath=no
-    hardcode_into_libs=yes
-    ;;
-  *) # from 4.6 on, and DragonFly
-    shlibpath_overrides_runpath=yes
-    hardcode_into_libs=yes
-    ;;
-  esac
-  ;;
-
-gnu*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}${major} ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-haiku*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  dynamic_linker="$host_os runtime_loader"
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}${major} ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  sys_lib_dlsearch_path_spec='/boot/home/config/lib /boot/common/lib /boot/system/lib'
-  hardcode_into_libs=yes
-  ;;
-
-hpux9* | hpux10* | hpux11*)
-  # Give a soname corresponding to the major version so that dld.sl refuses to
-  # link against other versions.
-  version_type=sunos
-  need_lib_prefix=no
-  need_version=no
-  case $host_cpu in
-  ia64*)
-    shrext_cmds='.so'
-    hardcode_into_libs=yes
-    dynamic_linker="$host_os dld.so"
-    shlibpath_var=LD_LIBRARY_PATH
-    shlibpath_overrides_runpath=yes # Unless +noenvvar is specified.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    if test "X$HPUX_IA64_MODE" = X32; then
-      sys_lib_search_path_spec="/usr/lib/hpux32 /usr/local/lib/hpux32 /usr/local/lib"
-    else
-      sys_lib_search_path_spec="/usr/lib/hpux64 /usr/local/lib/hpux64"
-    fi
-    sys_lib_dlsearch_path_spec=$sys_lib_search_path_spec
-    ;;
-  hppa*64*)
-    shrext_cmds='.sl'
-    hardcode_into_libs=yes
-    dynamic_linker="$host_os dld.sl"
-    shlibpath_var=LD_LIBRARY_PATH # How should we handle SHLIB_PATH
-    shlibpath_overrides_runpath=yes # Unless +noenvvar is specified.
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    sys_lib_search_path_spec="/usr/lib/pa20_64 /usr/ccs/lib/pa20_64"
-    sys_lib_dlsearch_path_spec=$sys_lib_search_path_spec
-    ;;
-  *)
-    shrext_cmds='.sl'
-    dynamic_linker="$host_os dld.sl"
-    shlibpath_var=SHLIB_PATH
-    shlibpath_overrides_runpath=no # +s is required to enable SHLIB_PATH
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    ;;
-  esac
-  # HP-UX runs *really* slowly unless shared libraries are mode 555, ...
-  postinstall_cmds='chmod 555 $lib'
-  # or fails outright, so override atomically:
-  install_override_mode=555
-  ;;
-
-interix[[3-9]]*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  dynamic_linker='Interix 3.x ld.so.1 (PE, like ELF)'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-irix5* | irix6* | nonstopux*)
-  case $host_os in
-    nonstopux*) version_type=nonstopux ;;
-    *)
-	if test "$lt_cv_prog_gnu_ld" = yes; then
-		version_type=linux # correct to gnu/linux during the next big refactor
-	else
-		version_type=irix
-	fi ;;
-  esac
-  need_lib_prefix=no
-  need_version=no
-  soname_spec='${libname}${release}${shared_ext}$major'
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${release}${shared_ext} $libname${shared_ext}'
-  case $host_os in
-  irix5* | nonstopux*)
-    libsuff= shlibsuff=
-    ;;
-  *)
-    case $LD in # libtool.m4 will add one of these switches to LD
-    *-32|*"-32 "|*-melf32bsmip|*"-melf32bsmip ")
-      libsuff= shlibsuff= libmagic=32-bit;;
-    *-n32|*"-n32 "|*-melf32bmipn32|*"-melf32bmipn32 ")
-      libsuff=32 shlibsuff=N32 libmagic=N32;;
-    *-64|*"-64 "|*-melf64bmip|*"-melf64bmip ")
-      libsuff=64 shlibsuff=64 libmagic=64-bit;;
-    *) libsuff= shlibsuff= libmagic=never-match;;
-    esac
-    ;;
-  esac
-  shlibpath_var=LD_LIBRARY${shlibsuff}_PATH
-  shlibpath_overrides_runpath=no
-  sys_lib_search_path_spec="/usr/lib${libsuff} /lib${libsuff} /usr/local/lib${libsuff}"
-  sys_lib_dlsearch_path_spec="/usr/lib${libsuff} /lib${libsuff}"
-  hardcode_into_libs=yes
-  ;;
-
-# No shared lib support for Linux oldld, aout, or coff.
-linux*oldld* | linux*aout* | linux*coff*)
-  dynamic_linker=no
-  ;;
-
-# This must be glibc/ELF.
-linux* | k*bsd*-gnu | kopensolaris*-gnu)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig -n $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-
-  # Some binutils ld are patched to set DT_RUNPATH
-  AC_CACHE_VAL([lt_cv_shlibpath_overrides_runpath],
-    [lt_cv_shlibpath_overrides_runpath=no
-    save_LDFLAGS=$LDFLAGS
-    save_libdir=$libdir
-    eval "libdir=/foo; wl=\"$_LT_TAGVAR(lt_prog_compiler_wl, $1)\"; \
-	 LDFLAGS=\"\$LDFLAGS $_LT_TAGVAR(hardcode_libdir_flag_spec, $1)\""
-    AC_LINK_IFELSE([AC_LANG_PROGRAM([],[])],
-      [AS_IF([ ($OBJDUMP -p conftest$ac_exeext) 2>/dev/null | grep "RUNPATH.*$libdir" >/dev/null],
-	 [lt_cv_shlibpath_overrides_runpath=yes])])
-    LDFLAGS=$save_LDFLAGS
-    libdir=$save_libdir
-    ])
-  shlibpath_overrides_runpath=$lt_cv_shlibpath_overrides_runpath
-
-  # This implies no fast_install, which is unacceptable.
-  # Some rework will be needed to allow for fast_install
-  # before this can be enabled.
-  hardcode_into_libs=yes
-
-  # Append ld.so.conf contents to the search path
-  if test -f /etc/ld.so.conf; then
-    lt_ld_extra=`awk '/^include / { system(sprintf("cd /etc; cat %s 2>/dev/null", \[$]2)); skip = 1; } { if (!skip) print \[$]0; skip = 0; }' < /etc/ld.so.conf | $SED -e 's/#.*//;/^[	 ]*hwcap[	 ]/d;s/[:,	]/ /g;s/=[^=]*$//;s/=[^= ]* / /g;s/"//g;/^$/d' | tr '\n' ' '`
-    sys_lib_dlsearch_path_spec="/lib /usr/lib $lt_ld_extra"
-  fi
-
-  # We used to test for /lib/ld.so.1 and disable shared libraries on
-  # powerpc, because MkLinux only supported shared libraries with the
-  # GNU dynamic linker.  Since this was broken with cross compilers,
-  # most powerpc-linux boxes support dynamic linking these days and
-  # people can always --disable-shared, the test was removed, and we
-  # assume the GNU/Linux dynamic linker is in use.
-  dynamic_linker='GNU/Linux ld.so'
-  ;;
-
-netbsd*)
-  version_type=sunos
-  need_lib_prefix=no
-  need_version=no
-  if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-    finish_cmds='PATH="\$PATH:/sbin" ldconfig -m $libdir'
-    dynamic_linker='NetBSD (a.out) ld.so'
-  else
-    library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major ${libname}${shared_ext}'
-    soname_spec='${libname}${release}${shared_ext}$major'
-    dynamic_linker='NetBSD ld.elf_so'
-  fi
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  ;;
-
-newsos6)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  ;;
-
-*nto* | *qnx*)
-  version_type=qnx
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  dynamic_linker='ldqnx.so'
-  ;;
-
-openbsd*)
-  version_type=sunos
-  sys_lib_dlsearch_path_spec="/usr/lib"
-  need_lib_prefix=no
-  # Some older versions of OpenBSD (3.3 at least) *do* need versioned libs.
-  case $host_os in
-    openbsd3.3 | openbsd3.3.*)	need_version=yes ;;
-    *)				need_version=no  ;;
-  esac
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-  finish_cmds='PATH="\$PATH:/sbin" ldconfig -m $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  if test -z "`echo __ELF__ | $CC -E - | $GREP __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-    case $host_os in
-      openbsd2.[[89]] | openbsd2.[[89]].*)
-	shlibpath_overrides_runpath=no
-	;;
-      *)
-	shlibpath_overrides_runpath=yes
-	;;
-      esac
-  else
-    shlibpath_overrides_runpath=yes
-  fi
-  ;;
-
-os2*)
-  libname_spec='$name'
-  shrext_cmds=".dll"
-  need_lib_prefix=no
-  library_names_spec='$libname${shared_ext} $libname.a'
-  dynamic_linker='OS/2 ld.exe'
-  shlibpath_var=LIBPATH
-  ;;
-
-osf3* | osf4* | osf5*)
-  version_type=osf
-  need_lib_prefix=no
-  need_version=no
-  soname_spec='${libname}${release}${shared_ext}$major'
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  sys_lib_search_path_spec="/usr/shlib /usr/ccs/lib /usr/lib/cmplrs/cc /usr/lib /usr/local/lib /var/shlib"
-  sys_lib_dlsearch_path_spec="$sys_lib_search_path_spec"
-  ;;
-
-rdos*)
-  dynamic_linker=no
-  ;;
-
-solaris*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  # ldd complains unless libraries are executable
-  postinstall_cmds='chmod +x $lib'
-  ;;
-
-sunos4*)
-  version_type=sunos
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${shared_ext}$versuffix'
-  finish_cmds='PATH="\$PATH:/usr/etc" ldconfig $libdir'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  if test "$with_gnu_ld" = yes; then
-    need_lib_prefix=no
-  fi
-  need_version=yes
-  ;;
-
-sysv4 | sysv4.3*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  case $host_vendor in
-    sni)
-      shlibpath_overrides_runpath=no
-      need_lib_prefix=no
-      runpath_var=LD_RUN_PATH
-      ;;
-    siemens)
-      need_lib_prefix=no
-      ;;
-    motorola)
-      need_lib_prefix=no
-      need_version=no
-      shlibpath_overrides_runpath=no
-      sys_lib_search_path_spec='/lib /usr/lib /usr/ccs/lib'
-      ;;
-  esac
-  ;;
-
-sysv4*MP*)
-  if test -d /usr/nec ;then
-    version_type=linux # correct to gnu/linux during the next big refactor
-    library_names_spec='$libname${shared_ext}.$versuffix $libname${shared_ext}.$major $libname${shared_ext}'
-    soname_spec='$libname${shared_ext}.$major'
-    shlibpath_var=LD_LIBRARY_PATH
-  fi
-  ;;
-
-sysv5* | sco3.2v5* | sco5v6* | unixware* | OpenUNIX* | sysv4*uw2*)
-  version_type=freebsd-elf
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext} $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=yes
-  hardcode_into_libs=yes
-  if test "$with_gnu_ld" = yes; then
-    sys_lib_search_path_spec='/usr/local/lib /usr/gnu/lib /usr/ccs/lib /usr/lib /lib'
-  else
-    sys_lib_search_path_spec='/usr/ccs/lib /usr/lib'
-    case $host_os in
-      sco3.2v5*)
-        sys_lib_search_path_spec="$sys_lib_search_path_spec /lib"
-	;;
-    esac
-  fi
-  sys_lib_dlsearch_path_spec='/usr/lib'
-  ;;
-
-tpf*)
-  # TPF is a cross-target only.  Preferred cross-host = GNU/Linux.
-  version_type=linux # correct to gnu/linux during the next big refactor
-  need_lib_prefix=no
-  need_version=no
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  shlibpath_var=LD_LIBRARY_PATH
-  shlibpath_overrides_runpath=no
-  hardcode_into_libs=yes
-  ;;
-
-uts4*)
-  version_type=linux # correct to gnu/linux during the next big refactor
-  library_names_spec='${libname}${release}${shared_ext}$versuffix ${libname}${release}${shared_ext}$major $libname${shared_ext}'
-  soname_spec='${libname}${release}${shared_ext}$major'
-  shlibpath_var=LD_LIBRARY_PATH
-  ;;
-
-*)
-  dynamic_linker=no
-  ;;
-esac
-AC_MSG_RESULT([$dynamic_linker])
-test "$dynamic_linker" = no && can_build_shared=no
-
-variables_saved_for_relink="PATH $shlibpath_var $runpath_var"
-if test "$GCC" = yes; then
-  variables_saved_for_relink="$variables_saved_for_relink GCC_EXEC_PREFIX COMPILER_PATH LIBRARY_PATH"
-fi
-
-if test "${lt_cv_sys_lib_search_path_spec+set}" = set; then
-  sys_lib_search_path_spec="$lt_cv_sys_lib_search_path_spec"
-fi
-if test "${lt_cv_sys_lib_dlsearch_path_spec+set}" = set; then
-  sys_lib_dlsearch_path_spec="$lt_cv_sys_lib_dlsearch_path_spec"
-fi
-
-_LT_DECL([], [variables_saved_for_relink], [1],
-    [Variables whose values should be saved in libtool wrapper scripts and
-    restored at link time])
-_LT_DECL([], [need_lib_prefix], [0],
-    [Do we need the "lib" prefix for modules?])
-_LT_DECL([], [need_version], [0], [Do we need a version for libraries?])
-_LT_DECL([], [version_type], [0], [Library versioning type])
-_LT_DECL([], [runpath_var], [0],  [Shared library runtime path variable])
-_LT_DECL([], [shlibpath_var], [0],[Shared library path variable])
-_LT_DECL([], [shlibpath_overrides_runpath], [0],
-    [Is shlibpath searched before the hard-coded library search path?])
-_LT_DECL([], [libname_spec], [1], [Format of library name prefix])
-_LT_DECL([], [library_names_spec], [1],
-    [[List of archive names.  First name is the real one, the rest are links.
-    The last name is the one that the linker finds with -lNAME]])
-_LT_DECL([], [soname_spec], [1],
-    [[The coded name of the library, if different from the real name]])
-_LT_DECL([], [install_override_mode], [1],
-    [Permission mode override for installation of shared libraries])
-_LT_DECL([], [postinstall_cmds], [2],
-    [Command to use after installation of a shared archive])
-_LT_DECL([], [postuninstall_cmds], [2],
-    [Command to use after uninstallation of a shared archive])
-_LT_DECL([], [finish_cmds], [2],
-    [Commands used to finish a libtool library installation in a directory])
-_LT_DECL([], [finish_eval], [1],
-    [[As "finish_cmds", except a single script fragment to be evaled but
-    not shown]])
-_LT_DECL([], [hardcode_into_libs], [0],
-    [Whether we should hardcode library paths into libraries])
-_LT_DECL([], [sys_lib_search_path_spec], [2],
-    [Compile-time system search path for libraries])
-_LT_DECL([], [sys_lib_dlsearch_path_spec], [2],
-    [Run-time system search path for libraries])
-])# _LT_SYS_DYNAMIC_LINKER
-
-
-# _LT_PATH_TOOL_PREFIX(TOOL)
-# --------------------------
-# find a file program which can recognize shared library
-AC_DEFUN([_LT_PATH_TOOL_PREFIX],
-[m4_require([_LT_DECL_EGREP])dnl
-AC_MSG_CHECKING([for $1])
-AC_CACHE_VAL(lt_cv_path_MAGIC_CMD,
-[case $MAGIC_CMD in
-[[\\/*] |  ?:[\\/]*])
-  lt_cv_path_MAGIC_CMD="$MAGIC_CMD" # Let the user override the test with a path.
-  ;;
-*)
-  lt_save_MAGIC_CMD="$MAGIC_CMD"
-  lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-dnl $ac_dummy forces splitting on constant user-supplied paths.
-dnl POSIX.2 word splitting is done only on the output of word expansions,
-dnl not every word.  This closes a longstanding sh security hole.
-  ac_dummy="m4_if([$2], , $PATH, [$2])"
-  for ac_dir in $ac_dummy; do
-    IFS="$lt_save_ifs"
-    test -z "$ac_dir" && ac_dir=.
-    if test -f $ac_dir/$1; then
-      lt_cv_path_MAGIC_CMD="$ac_dir/$1"
-      if test -n "$file_magic_test_file"; then
-	case $deplibs_check_method in
-	"file_magic "*)
-	  file_magic_regex=`expr "$deplibs_check_method" : "file_magic \(.*\)"`
-	  MAGIC_CMD="$lt_cv_path_MAGIC_CMD"
-	  if eval $file_magic_cmd \$file_magic_test_file 2> /dev/null |
-	    $EGREP "$file_magic_regex" > /dev/null; then
-	    :
-	  else
-	    cat <<_LT_EOF 1>&2
-
-*** Warning: the command libtool uses to detect shared libraries,
-*** $file_magic_cmd, produces output that libtool cannot recognize.
-*** The result is that libtool may fail to recognize shared libraries
-*** as such.  This will affect the creation of libtool libraries that
-*** depend on shared libraries, but programs linked with such libtool
-*** libraries will work regardless of this problem.  Nevertheless, you
-*** may want to report the problem to your system manager and/or to
-*** bug-libtool@gnu.org
-
-_LT_EOF
-	  fi ;;
-	esac
-      fi
-      break
-    fi
-  done
-  IFS="$lt_save_ifs"
-  MAGIC_CMD="$lt_save_MAGIC_CMD"
-  ;;
-esac])
-MAGIC_CMD="$lt_cv_path_MAGIC_CMD"
-if test -n "$MAGIC_CMD"; then
-  AC_MSG_RESULT($MAGIC_CMD)
-else
-  AC_MSG_RESULT(no)
-fi
-_LT_DECL([], [MAGIC_CMD], [0],
-	 [Used to examine libraries when file_magic_cmd begins with "file"])dnl
-])# _LT_PATH_TOOL_PREFIX
-
-# Old name:
-AU_ALIAS([AC_PATH_TOOL_PREFIX], [_LT_PATH_TOOL_PREFIX])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_PATH_TOOL_PREFIX], [])
-
-
-# _LT_PATH_MAGIC
-# --------------
-# find a file program which can recognize a shared library
-m4_defun([_LT_PATH_MAGIC],
-[_LT_PATH_TOOL_PREFIX(${ac_tool_prefix}file, /usr/bin$PATH_SEPARATOR$PATH)
-if test -z "$lt_cv_path_MAGIC_CMD"; then
-  if test -n "$ac_tool_prefix"; then
-    _LT_PATH_TOOL_PREFIX(file, /usr/bin$PATH_SEPARATOR$PATH)
-  else
-    MAGIC_CMD=:
-  fi
-fi
-])# _LT_PATH_MAGIC
-
-
-# LT_PATH_LD
-# ----------
-# find the pathname to the GNU or non-GNU linker
-AC_DEFUN([LT_PATH_LD],
-[AC_REQUIRE([AC_PROG_CC])dnl
-AC_REQUIRE([AC_CANONICAL_HOST])dnl
-AC_REQUIRE([AC_CANONICAL_BUILD])dnl
-m4_require([_LT_DECL_SED])dnl
-m4_require([_LT_DECL_EGREP])dnl
-m4_require([_LT_PROG_ECHO_BACKSLASH])dnl
-
-AC_ARG_WITH([gnu-ld],
-    [AS_HELP_STRING([--with-gnu-ld],
-	[assume the C compiler uses GNU ld @<:@default=no@:>@])],
-    [test "$withval" = no || with_gnu_ld=yes],
-    [with_gnu_ld=no])dnl
-
-ac_prog=ld
-if test "$GCC" = yes; then
-  # Check if gcc -print-prog-name=ld gives a path.
-  AC_MSG_CHECKING([for ld used by $CC])
-  case $host in
-  *-*-mingw*)
-    # gcc leaves a trailing carriage return which upsets mingw
-    ac_prog=`($CC -print-prog-name=ld) 2>&5 | tr -d '\015'` ;;
-  *)
-    ac_prog=`($CC -print-prog-name=ld) 2>&5` ;;
-  esac
-  case $ac_prog in
-    # Accept absolute paths.
-    [[\\/]]* | ?:[[\\/]]*)
-      re_direlt='/[[^/]][[^/]]*/\.\./'
-      # Canonicalize the pathname of ld
-      ac_prog=`$ECHO "$ac_prog"| $SED 's%\\\\%/%g'`
-      while $ECHO "$ac_prog" | $GREP "$re_direlt" > /dev/null 2>&1; do
-	ac_prog=`$ECHO $ac_prog| $SED "s%$re_direlt%/%"`
-      done
-      test -z "$LD" && LD="$ac_prog"
-      ;;
-  "")
-    # If it fails, then pretend we aren't using GCC.
-    ac_prog=ld
-    ;;
-  *)
-    # If it is relative, then search for the first ld in PATH.
-    with_gnu_ld=unknown
-    ;;
-  esac
-elif test "$with_gnu_ld" = yes; then
-  AC_MSG_CHECKING([for GNU ld])
-else
-  AC_MSG_CHECKING([for non-GNU ld])
-fi
-AC_CACHE_VAL(lt_cv_path_LD,
-[if test -z "$LD"; then
-  lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-  for ac_dir in $PATH; do
-    IFS="$lt_save_ifs"
-    test -z "$ac_dir" && ac_dir=.
-    if test -f "$ac_dir/$ac_prog" || test -f "$ac_dir/$ac_prog$ac_exeext"; then
-      lt_cv_path_LD="$ac_dir/$ac_prog"
-      # Check to see if the program is GNU ld.  I'd rather use --version,
-      # but apparently some variants of GNU ld only accept -v.
-      # Break only if it was the GNU/non-GNU ld that we prefer.
-      case `"$lt_cv_path_LD" -v 2>&1 </dev/null` in
-      *GNU* | *'with BFD'*)
-	test "$with_gnu_ld" != no && break
-	;;
-      *)
-	test "$with_gnu_ld" != yes && break
-	;;
-      esac
-    fi
-  done
-  IFS="$lt_save_ifs"
-else
-  lt_cv_path_LD="$LD" # Let the user override the test with a path.
-fi])
-LD="$lt_cv_path_LD"
-if test -n "$LD"; then
-  AC_MSG_RESULT($LD)
-else
-  AC_MSG_RESULT(no)
-fi
-test -z "$LD" && AC_MSG_ERROR([no acceptable ld found in \$PATH])
-_LT_PATH_LD_GNU
-AC_SUBST([LD])
-
-_LT_TAGDECL([], [LD], [1], [The linker used to build libraries])
-])# LT_PATH_LD
-
-# Old names:
-AU_ALIAS([AM_PROG_LD], [LT_PATH_LD])
-AU_ALIAS([AC_PROG_LD], [LT_PATH_LD])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AM_PROG_LD], [])
-dnl AC_DEFUN([AC_PROG_LD], [])
-
-
-# _LT_PATH_LD_GNU
-#- --------------
-m4_defun([_LT_PATH_LD_GNU],
-[AC_CACHE_CHECK([if the linker ($LD) is GNU ld], lt_cv_prog_gnu_ld,
-[# I'd rather use --version here, but apparently some GNU lds only accept -v.
-case `$LD -v 2>&1 </dev/null` in
-*GNU* | *'with BFD'*)
-  lt_cv_prog_gnu_ld=yes
-  ;;
-*)
-  lt_cv_prog_gnu_ld=no
-  ;;
-esac])
-with_gnu_ld=$lt_cv_prog_gnu_ld
-])# _LT_PATH_LD_GNU
-
-
-# _LT_CMD_RELOAD
-# --------------
-# find reload flag for linker
-#   -- PORTME Some linkers may need a different reload flag.
-m4_defun([_LT_CMD_RELOAD],
-[AC_CACHE_CHECK([for $LD option to reload object files],
-  lt_cv_ld_reload_flag,
-  [lt_cv_ld_reload_flag='-r'])
-reload_flag=$lt_cv_ld_reload_flag
-case $reload_flag in
-"" | " "*) ;;
-*) reload_flag=" $reload_flag" ;;
-esac
-reload_cmds='$LD$reload_flag -o $output$reload_objs'
-case $host_os in
-  cygwin* | mingw* | pw32* | cegcc*)
-    if test "$GCC" != yes; then
-      reload_cmds=false
-    fi
-    ;;
-  darwin*)
-    if test "$GCC" = yes; then
-      reload_cmds='$LTCC $LTCFLAGS -nostdlib ${wl}-r -o $output$reload_objs'
-    else
-      reload_cmds='$LD$reload_flag -o $output$reload_objs'
-    fi
-    ;;
-esac
-_LT_TAGDECL([], [reload_flag], [1], [How to create reloadable object files])dnl
-_LT_TAGDECL([], [reload_cmds], [2])dnl
-])# _LT_CMD_RELOAD
-
-
-# _LT_CHECK_MAGIC_METHOD
-# ----------------------
-# how to check for library dependencies
-#  -- PORTME fill in with the dynamic library characteristics
-m4_defun([_LT_CHECK_MAGIC_METHOD],
-[m4_require([_LT_DECL_EGREP])
-m4_require([_LT_DECL_OBJDUMP])
-AC_CACHE_CHECK([how to recognize dependent libraries],
-lt_cv_deplibs_check_method,
-[lt_cv_file_magic_cmd='$MAGIC_CMD'
-lt_cv_file_magic_test_file=
-lt_cv_deplibs_check_method='unknown'
-# Need to set the preceding variable on all platforms that support
-# interlibrary dependencies.
-# 'none' -- dependencies not supported.
-# `unknown' -- same as none, but documents that we really don't know.
-# 'pass_all' -- all dependencies passed with no checks.
-# 'test_compile' -- check by making test program.
-# 'file_magic [[regex]]' -- check by looking for files in library path
-# which responds to the $file_magic_cmd with a given extended regex.
-# If you have `file' or equivalent on your system and you're not sure
-# whether `pass_all' will *always* work, you probably want this one.
-
-case $host_os in
-aix[[4-9]]*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-beos*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-bsdi[[45]]*)
-  lt_cv_deplibs_check_method='file_magic ELF [[0-9]][[0-9]]*-bit [[ML]]SB (shared object|dynamic lib)'
-  lt_cv_file_magic_cmd='/usr/bin/file -L'
-  lt_cv_file_magic_test_file=/shlib/libc.so
-  ;;
-
-cygwin*)
-  # func_win32_libid is a shell function defined in ltmain.sh
-  lt_cv_deplibs_check_method='file_magic ^x86 archive import|^x86 DLL'
-  lt_cv_file_magic_cmd='func_win32_libid'
-  ;;
-
-mingw* | pw32*)
-  # Base MSYS/MinGW do not provide the 'file' command needed by
-  # func_win32_libid shell function, so use a weaker test based on 'objdump',
-  # unless we find 'file', for example because we are cross-compiling.
-  # func_win32_libid assumes BSD nm, so disallow it if using MS dumpbin.
-  if ( test "$lt_cv_nm_interface" = "BSD nm" && file / ) >/dev/null 2>&1; then
-    lt_cv_deplibs_check_method='file_magic ^x86 archive import|^x86 DLL'
-    lt_cv_file_magic_cmd='func_win32_libid'
-  else
-    # Keep this pattern in sync with the one in func_win32_libid.
-    lt_cv_deplibs_check_method='file_magic file format (pei*-i386(.*architecture: i386)?|pe-arm-wince|pe-x86-64)'
-    lt_cv_file_magic_cmd='$OBJDUMP -f'
-  fi
-  ;;
-
-cegcc*)
-  # use the weaker test based on 'objdump'. See mingw*.
-  lt_cv_deplibs_check_method='file_magic file format pe-arm-.*little(.*architecture: arm)?'
-  lt_cv_file_magic_cmd='$OBJDUMP -f'
-  ;;
-
-darwin* | rhapsody*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-freebsd* | dragonfly*)
-  if echo __ELF__ | $CC -E - | $GREP __ELF__ > /dev/null; then
-    case $host_cpu in
-    i*86 )
-      # Not sure whether the presence of OpenBSD here was a mistake.
-      # Let's accept both of them until this is cleared up.
-      lt_cv_deplibs_check_method='file_magic (FreeBSD|OpenBSD|DragonFly)/i[[3-9]]86 (compact )?demand paged shared library'
-      lt_cv_file_magic_cmd=/usr/bin/file
-      lt_cv_file_magic_test_file=`echo /usr/lib/libc.so.*`
-      ;;
-    esac
-  else
-    lt_cv_deplibs_check_method=pass_all
-  fi
-  ;;
-
-gnu*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-haiku*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-hpux10.20* | hpux11*)
-  lt_cv_file_magic_cmd=/usr/bin/file
-  case $host_cpu in
-  ia64*)
-    lt_cv_deplibs_check_method='file_magic (s[[0-9]][[0-9]][[0-9]]|ELF-[[0-9]][[0-9]]) shared object file - IA64'
-    lt_cv_file_magic_test_file=/usr/lib/hpux32/libc.so
-    ;;
-  hppa*64*)
-    [lt_cv_deplibs_check_method='file_magic (s[0-9][0-9][0-9]|ELF[ -][0-9][0-9])(-bit)?( [LM]SB)? shared object( file)?[, -]* PA-RISC [0-9]\.[0-9]']
-    lt_cv_file_magic_test_file=/usr/lib/pa20_64/libc.sl
-    ;;
-  *)
-    lt_cv_deplibs_check_method='file_magic (s[[0-9]][[0-9]][[0-9]]|PA-RISC[[0-9]]\.[[0-9]]) shared library'
-    lt_cv_file_magic_test_file=/usr/lib/libc.sl
-    ;;
-  esac
-  ;;
-
-interix[[3-9]]*)
-  # PIC code is broken on Interix 3.x, that's why |\.a not |_pic\.a here
-  lt_cv_deplibs_check_method='match_pattern /lib[[^/]]+(\.so|\.a)$'
-  ;;
-
-irix5* | irix6* | nonstopux*)
-  case $LD in
-  *-32|*"-32 ") libmagic=32-bit;;
-  *-n32|*"-n32 ") libmagic=N32;;
-  *-64|*"-64 ") libmagic=64-bit;;
-  *) libmagic=never-match;;
-  esac
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-# This must be glibc/ELF.
-linux* | k*bsd*-gnu | kopensolaris*-gnu)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-netbsd*)
-  if echo __ELF__ | $CC -E - | $GREP __ELF__ > /dev/null; then
-    lt_cv_deplibs_check_method='match_pattern /lib[[^/]]+(\.so\.[[0-9]]+\.[[0-9]]+|_pic\.a)$'
-  else
-    lt_cv_deplibs_check_method='match_pattern /lib[[^/]]+(\.so|_pic\.a)$'
-  fi
-  ;;
-
-newos6*)
-  lt_cv_deplibs_check_method='file_magic ELF [[0-9]][[0-9]]*-bit [[ML]]SB (executable|dynamic lib)'
-  lt_cv_file_magic_cmd=/usr/bin/file
-  lt_cv_file_magic_test_file=/usr/lib/libnls.so
-  ;;
-
-*nto* | *qnx*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-openbsd*)
-  if test -z "`echo __ELF__ | $CC -E - | $GREP __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-    lt_cv_deplibs_check_method='match_pattern /lib[[^/]]+(\.so\.[[0-9]]+\.[[0-9]]+|\.so|_pic\.a)$'
-  else
-    lt_cv_deplibs_check_method='match_pattern /lib[[^/]]+(\.so\.[[0-9]]+\.[[0-9]]+|_pic\.a)$'
-  fi
-  ;;
-
-osf3* | osf4* | osf5*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-rdos*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-solaris*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-sysv5* | sco3.2v5* | sco5v6* | unixware* | OpenUNIX* | sysv4*uw2*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-
-sysv4 | sysv4.3*)
-  case $host_vendor in
-  motorola)
-    lt_cv_deplibs_check_method='file_magic ELF [[0-9]][[0-9]]*-bit [[ML]]SB (shared object|dynamic lib) M[[0-9]][[0-9]]* Version [[0-9]]'
-    lt_cv_file_magic_test_file=`echo /usr/lib/libc.so*`
-    ;;
-  ncr)
-    lt_cv_deplibs_check_method=pass_all
-    ;;
-  sequent)
-    lt_cv_file_magic_cmd='/bin/file'
-    lt_cv_deplibs_check_method='file_magic ELF [[0-9]][[0-9]]*-bit [[LM]]SB (shared object|dynamic lib )'
-    ;;
-  sni)
-    lt_cv_file_magic_cmd='/bin/file'
-    lt_cv_deplibs_check_method="file_magic ELF [[0-9]][[0-9]]*-bit [[LM]]SB dynamic lib"
-    lt_cv_file_magic_test_file=/lib/libc.so
-    ;;
-  siemens)
-    lt_cv_deplibs_check_method=pass_all
-    ;;
-  pc)
-    lt_cv_deplibs_check_method=pass_all
-    ;;
-  esac
-  ;;
-
-tpf*)
-  lt_cv_deplibs_check_method=pass_all
-  ;;
-esac
-])
-
-file_magic_glob=
-want_nocaseglob=no
-if test "$build" = "$host"; then
-  case $host_os in
-  mingw* | pw32*)
-    if ( shopt | grep nocaseglob ) >/dev/null 2>&1; then
-      want_nocaseglob=yes
-    else
-      file_magic_glob=`echo aAbBcCdDeEfFgGhHiIjJkKlLmMnNoOpPqQrRsStTuUvVwWxXyYzZ | $SED -e "s/\(..\)/s\/[[\1]]\/[[\1]]\/g;/g"`
-    fi
-    ;;
-  esac
-fi
-
-file_magic_cmd=$lt_cv_file_magic_cmd
-deplibs_check_method=$lt_cv_deplibs_check_method
-test -z "$deplibs_check_method" && deplibs_check_method=unknown
-
-_LT_DECL([], [deplibs_check_method], [1],
-    [Method to check whether dependent libraries are shared objects])
-_LT_DECL([], [file_magic_cmd], [1],
-    [Command to use when deplibs_check_method = "file_magic"])
-_LT_DECL([], [file_magic_glob], [1],
-    [How to find potential files when deplibs_check_method = "file_magic"])
-_LT_DECL([], [want_nocaseglob], [1],
-    [Find potential files using nocaseglob when deplibs_check_method = "file_magic"])
-])# _LT_CHECK_MAGIC_METHOD
-
-
-# LT_PATH_NM
-# ----------
-# find the pathname to a BSD- or MS-compatible name lister
-AC_DEFUN([LT_PATH_NM],
-[AC_REQUIRE([AC_PROG_CC])dnl
-AC_CACHE_CHECK([for BSD- or MS-compatible name lister (nm)], lt_cv_path_NM,
-[if test -n "$NM"; then
-  # Let the user override the test.
-  lt_cv_path_NM="$NM"
-else
-  lt_nm_to_check="${ac_tool_prefix}nm"
-  if test -n "$ac_tool_prefix" && test "$build" = "$host"; then
-    lt_nm_to_check="$lt_nm_to_check nm"
-  fi
-  for lt_tmp_nm in $lt_nm_to_check; do
-    lt_save_ifs="$IFS"; IFS=$PATH_SEPARATOR
-    for ac_dir in $PATH /usr/ccs/bin/elf /usr/ccs/bin /usr/ucb /bin; do
-      IFS="$lt_save_ifs"
-      test -z "$ac_dir" && ac_dir=.
-      tmp_nm="$ac_dir/$lt_tmp_nm"
-      if test -f "$tmp_nm" || test -f "$tmp_nm$ac_exeext" ; then
-	# Check to see if the nm accepts a BSD-compat flag.
-	# Adding the `sed 1q' prevents false positives on HP-UX, which says:
-	#   nm: unknown option "B" ignored
-	# Tru64's nm complains that /dev/null is an invalid object file
-	case `"$tmp_nm" -B /dev/null 2>&1 | sed '1q'` in
-	*/dev/null* | *'Invalid file or object type'*)
-	  lt_cv_path_NM="$tmp_nm -B"
-	  break
-	  ;;
-	*)
-	  case `"$tmp_nm" -p /dev/null 2>&1 | sed '1q'` in
-	  */dev/null*)
-	    lt_cv_path_NM="$tmp_nm -p"
-	    break
-	    ;;
-	  *)
-	    lt_cv_path_NM=${lt_cv_path_NM="$tmp_nm"} # keep the first match, but
-	    continue # so that we can try to find one that supports BSD flags
-	    ;;
-	  esac
-	  ;;
-	esac
-      fi
-    done
-    IFS="$lt_save_ifs"
-  done
-  : ${lt_cv_path_NM=no}
-fi])
-if test "$lt_cv_path_NM" != "no"; then
-  NM="$lt_cv_path_NM"
-else
-  # Didn't find any BSD compatible name lister, look for dumpbin.
-  if test -n "$DUMPBIN"; then :
-    # Let the user override the test.
-  else
-    AC_CHECK_TOOLS(DUMPBIN, [dumpbin "link -dump"], :)
-    case `$DUMPBIN -symbols /dev/null 2>&1 | sed '1q'` in
-    *COFF*)
-      DUMPBIN="$DUMPBIN -symbols"
-      ;;
-    *)
-      DUMPBIN=:
-      ;;
-    esac
-  fi
-  AC_SUBST([DUMPBIN])
-  if test "$DUMPBIN" != ":"; then
-    NM="$DUMPBIN"
-  fi
-fi
-test -z "$NM" && NM=nm
-AC_SUBST([NM])
-_LT_DECL([], [NM], [1], [A BSD- or MS-compatible name lister])dnl
-
-AC_CACHE_CHECK([the name lister ($NM) interface], [lt_cv_nm_interface],
-  [lt_cv_nm_interface="BSD nm"
-  echo "int some_variable = 0;" > conftest.$ac_ext
-  (eval echo "\"\$as_me:$LINENO: $ac_compile\"" >&AS_MESSAGE_LOG_FD)
-  (eval "$ac_compile" 2>conftest.err)
-  cat conftest.err >&AS_MESSAGE_LOG_FD
-  (eval echo "\"\$as_me:$LINENO: $NM \\\"conftest.$ac_objext\\\"\"" >&AS_MESSAGE_LOG_FD)
-  (eval "$NM \"conftest.$ac_objext\"" 2>conftest.err > conftest.out)
-  cat conftest.err >&AS_MESSAGE_LOG_FD
-  (eval echo "\"\$as_me:$LINENO: output\"" >&AS_MESSAGE_LOG_FD)
-  cat conftest.out >&AS_MESSAGE_LOG_FD
-  if $GREP 'External.*some_variable' conftest.out > /dev/null; then
-    lt_cv_nm_interface="MS dumpbin"
-  fi
-  rm -f conftest*])
-])# LT_PATH_NM
-
-# Old names:
-AU_ALIAS([AM_PROG_NM], [LT_PATH_NM])
-AU_ALIAS([AC_PROG_NM], [LT_PATH_NM])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AM_PROG_NM], [])
-dnl AC_DEFUN([AC_PROG_NM], [])
-
-# _LT_CHECK_SHAREDLIB_FROM_LINKLIB
-# --------------------------------
-# how to determine the name of the shared library
-# associated with a specific link library.
-#  -- PORTME fill in with the dynamic library characteristics
-m4_defun([_LT_CHECK_SHAREDLIB_FROM_LINKLIB],
-[m4_require([_LT_DECL_EGREP])
-m4_require([_LT_DECL_OBJDUMP])
-m4_require([_LT_DECL_DLLTOOL])
-AC_CACHE_CHECK([how to associate runtime and link libraries],
-lt_cv_sharedlib_from_linklib_cmd,
-[lt_cv_sharedlib_from_linklib_cmd='unknown'
-
-case $host_os in
-cygwin* | mingw* | pw32* | cegcc*)
-  # two different shell functions defined in ltmain.sh
-  # decide which to use based on capabilities of $DLLTOOL
-  case `$DLLTOOL --help 2>&1` in
-  *--identify-strict*)
-    lt_cv_sharedlib_from_linklib_cmd=func_cygming_dll_for_implib
-    ;;
-  *)
-    lt_cv_sharedlib_from_linklib_cmd=func_cygming_dll_for_implib_fallback
-    ;;
-  esac
-  ;;
-*)
-  # fallback: assume linklib IS sharedlib
-  lt_cv_sharedlib_from_linklib_cmd="$ECHO"
-  ;;
-esac
-])
-sharedlib_from_linklib_cmd=$lt_cv_sharedlib_from_linklib_cmd
-test -z "$sharedlib_from_linklib_cmd" && sharedlib_from_linklib_cmd=$ECHO
-
-_LT_DECL([], [sharedlib_from_linklib_cmd], [1],
-    [Command to associate shared and link libraries])
-])# _LT_CHECK_SHAREDLIB_FROM_LINKLIB
-
-
-# _LT_PATH_MANIFEST_TOOL
-# ----------------------
-# locate the manifest tool
-m4_defun([_LT_PATH_MANIFEST_TOOL],
-[AC_CHECK_TOOL(MANIFEST_TOOL, mt, :)
-test -z "$MANIFEST_TOOL" && MANIFEST_TOOL=mt
-AC_CACHE_CHECK([if $MANIFEST_TOOL is a manifest tool], [lt_cv_path_mainfest_tool],
-  [lt_cv_path_mainfest_tool=no
-  echo "$as_me:$LINENO: $MANIFEST_TOOL '-?'" >&AS_MESSAGE_LOG_FD
-  $MANIFEST_TOOL '-?' 2>conftest.err > conftest.out
-  cat conftest.err >&AS_MESSAGE_LOG_FD
-  if $GREP 'Manifest Tool' conftest.out > /dev/null; then
-    lt_cv_path_mainfest_tool=yes
-  fi
-  rm -f conftest*])
-if test "x$lt_cv_path_mainfest_tool" != xyes; then
-  MANIFEST_TOOL=:
-fi
-_LT_DECL([], [MANIFEST_TOOL], [1], [Manifest tool])dnl
-])# _LT_PATH_MANIFEST_TOOL
-
-
-# LT_LIB_M
-# --------
-# check for math library
-AC_DEFUN([LT_LIB_M],
-[AC_REQUIRE([AC_CANONICAL_HOST])dnl
-LIBM=
-case $host in
-*-*-beos* | *-*-cegcc* | *-*-cygwin* | *-*-haiku* | *-*-pw32* | *-*-darwin*)
-  # These system don't have libm, or don't need it
-  ;;
-*-ncr-sysv4.3*)
-  AC_CHECK_LIB(mw, _mwvalidcheckl, LIBM="-lmw")
-  AC_CHECK_LIB(m, cos, LIBM="$LIBM -lm")
-  ;;
-*)
-  AC_CHECK_LIB(m, cos, LIBM="-lm")
-  ;;
-esac
-AC_SUBST([LIBM])
-])# LT_LIB_M
-
-# Old name:
-AU_ALIAS([AC_CHECK_LIBM], [LT_LIB_M])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_CHECK_LIBM], [])
-
-
-# _LT_COMPILER_NO_RTTI([TAGNAME])
-# -------------------------------
-m4_defun([_LT_COMPILER_NO_RTTI],
-[m4_require([_LT_TAG_COMPILER])dnl
-
-_LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1)=
-
-if test "$GCC" = yes; then
-  case $cc_basename in
-  nvcc*)
-    _LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1)=' -Xcompiler -fno-builtin' ;;
-  *)
-    _LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1)=' -fno-builtin' ;;
-  esac
-
-  _LT_COMPILER_OPTION([if $compiler supports -fno-rtti -fno-exceptions],
-    lt_cv_prog_compiler_rtti_exceptions,
-    [-fno-rtti -fno-exceptions], [],
-    [_LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1)="$_LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1) -fno-rtti -fno-exceptions"])
-fi
-_LT_TAGDECL([no_builtin_flag], [lt_prog_compiler_no_builtin_flag], [1],
-	[Compiler flag to turn off builtin functions])
-])# _LT_COMPILER_NO_RTTI
-
-
-# _LT_CMD_GLOBAL_SYMBOLS
-# ----------------------
-m4_defun([_LT_CMD_GLOBAL_SYMBOLS],
-[AC_REQUIRE([AC_CANONICAL_HOST])dnl
-AC_REQUIRE([AC_PROG_CC])dnl
-AC_REQUIRE([AC_PROG_AWK])dnl
-AC_REQUIRE([LT_PATH_NM])dnl
-AC_REQUIRE([LT_PATH_LD])dnl
-m4_require([_LT_DECL_SED])dnl
-m4_require([_LT_DECL_EGREP])dnl
-m4_require([_LT_TAG_COMPILER])dnl
-
-# Check for command to grab the raw symbol name followed by C symbol from nm.
-AC_MSG_CHECKING([command to parse $NM output from $compiler object])
-AC_CACHE_VAL([lt_cv_sys_global_symbol_pipe],
-[
-# These are sane defaults that work on at least a few old systems.
-# [They come from Ultrix.  What could be older than Ultrix?!! ;)]
-
-# Character class describing NM global symbol codes.
-symcode='[[BCDEGRST]]'
-
-# Regexp to match symbols that can be accessed directly from C.
-sympat='\([[_A-Za-z]][[_A-Za-z0-9]]*\)'
-
-# Define system-specific variables.
-case $host_os in
-aix*)
-  symcode='[[BCDT]]'
-  ;;
-cygwin* | mingw* | pw32* | cegcc*)
-  symcode='[[ABCDGISTW]]'
-  ;;
-hpux*)
-  if test "$host_cpu" = ia64; then
-    symcode='[[ABCDEGRST]]'
-  fi
-  ;;
-irix* | nonstopux*)
-  symcode='[[BCDEGRST]]'
-  ;;
-osf*)
-  symcode='[[BCDEGQRST]]'
-  ;;
-solaris*)
-  symcode='[[BDRT]]'
-  ;;
-sco3.2v5*)
-  symcode='[[DT]]'
-  ;;
-sysv4.2uw2*)
-  symcode='[[DT]]'
-  ;;
-sysv5* | sco5v6* | unixware* | OpenUNIX*)
-  symcode='[[ABDT]]'
-  ;;
-sysv4)
-  symcode='[[DFNSTU]]'
-  ;;
-esac
-
-# If we're using GNU nm, then use its standard symbol codes.
-case `$NM -V 2>&1` in
-*GNU* | *'with BFD'*)
-  symcode='[[ABCDGIRSTW]]' ;;
-esac
-
-# Transform an extracted symbol line into a proper C declaration.
-# Some systems (esp. on ia64) link data and code symbols differently,
-# so use this general approach.
-lt_cv_sys_global_symbol_to_cdecl="sed -n -e 's/^T .* \(.*\)$/extern int \1();/p' -e 's/^$symcode* .* \(.*\)$/extern char \1;/p'"
-
-# Transform an extracted symbol line into symbol name and symbol address
-lt_cv_sys_global_symbol_to_c_name_address="sed -n -e 's/^: \([[^ ]]*\)[[ ]]*$/  {\\\"\1\\\", (void *) 0},/p' -e 's/^$symcode* \([[^ ]]*\) \([[^ ]]*\)$/  {\"\2\", (void *) \&\2},/p'"
-lt_cv_sys_global_symbol_to_c_name_address_lib_prefix="sed -n -e 's/^: \([[^ ]]*\)[[ ]]*$/  {\\\"\1\\\", (void *) 0},/p' -e 's/^$symcode* \([[^ ]]*\) \(lib[[^ ]]*\)$/  {\"\2\", (void *) \&\2},/p' -e 's/^$symcode* \([[^ ]]*\) \([[^ ]]*\)$/  {\"lib\2\", (void *) \&\2},/p'"
-
-# Handle CRLF in mingw tool chain
-opt_cr=
-case $build_os in
-mingw*)
-  opt_cr=`$ECHO 'x\{0,1\}' | tr x '\015'` # option cr in regexp
-  ;;
-esac
-
-# Try without a prefix underscore, then with it.
-for ac_symprfx in "" "_"; do
-
-  # Transform symcode, sympat, and symprfx into a raw symbol and a C symbol.
-  symxfrm="\\1 $ac_symprfx\\2 \\2"
-
-  # Write the raw and C identifiers.
-  if test "$lt_cv_nm_interface" = "MS dumpbin"; then
-    # Fake it for dumpbin and say T for any non-static function
-    # and D for any global variable.
-    # Also find C++ and __fastcall symbols from MSVC++,
-    # which start with @ or ?.
-    lt_cv_sys_global_symbol_pipe="$AWK ['"\
-"     {last_section=section; section=\$ 3};"\
-"     /^COFF SYMBOL TABLE/{for(i in hide) delete hide[i]};"\
-"     /Section length .*#relocs.*(pick any)/{hide[last_section]=1};"\
-"     \$ 0!~/External *\|/{next};"\
-"     / 0+ UNDEF /{next}; / UNDEF \([^|]\)*()/{next};"\
-"     {if(hide[section]) next};"\
-"     {f=0}; \$ 0~/\(\).*\|/{f=1}; {printf f ? \"T \" : \"D \"};"\
-"     {split(\$ 0, a, /\||\r/); split(a[2], s)};"\
-"     s[1]~/^[@?]/{print s[1], s[1]; next};"\
-"     s[1]~prfx {split(s[1],t,\"@\"); print t[1], substr(t[1],length(prfx))}"\
-"     ' prfx=^$ac_symprfx]"
-  else
-    lt_cv_sys_global_symbol_pipe="sed -n -e 's/^.*[[	 ]]\($symcode$symcode*\)[[	 ]][[	 ]]*$ac_symprfx$sympat$opt_cr$/$symxfrm/p'"
-  fi
-  lt_cv_sys_global_symbol_pipe="$lt_cv_sys_global_symbol_pipe | sed '/ __gnu_lto/d'"
-
-  # Check to see that the pipe works correctly.
-  pipe_works=no
-
-  rm -f conftest*
-  cat > conftest.$ac_ext <<_LT_EOF
-#ifdef __cplusplus
-extern "C" {
-#endif
-char nm_test_var;
-void nm_test_func(void);
-void nm_test_func(void){}
-#ifdef __cplusplus
-}
-#endif
-int main(){nm_test_var='a';nm_test_func();return(0);}
-_LT_EOF
-
-  if AC_TRY_EVAL(ac_compile); then
-    # Now try to grab the symbols.
-    nlist=conftest.nm
-    if AC_TRY_EVAL(NM conftest.$ac_objext \| "$lt_cv_sys_global_symbol_pipe" \> $nlist) && test -s "$nlist"; then
-      # Try sorting and uniquifying the output.
-      if sort "$nlist" | uniq > "$nlist"T; then
-	mv -f "$nlist"T "$nlist"
-      else
-	rm -f "$nlist"T
-      fi
-
-      # Make sure that we snagged all the symbols we need.
-      if $GREP ' nm_test_var$' "$nlist" >/dev/null; then
-	if $GREP ' nm_test_func$' "$nlist" >/dev/null; then
-	  cat <<_LT_EOF > conftest.$ac_ext
-/* Keep this code in sync between libtool.m4, ltmain, lt_system.h, and tests.  */
-#if defined(_WIN32) || defined(__CYGWIN__) || defined(_WIN32_WCE)
-/* DATA imports from DLLs on WIN32 con't be const, because runtime
-   relocations are performed -- see ld's documentation on pseudo-relocs.  */
-# define LT@&t@_DLSYM_CONST
-#elif defined(__osf__)
-/* This system does not cope well with relocations in const data.  */
-# define LT@&t@_DLSYM_CONST
-#else
-# define LT@&t@_DLSYM_CONST const
-#endif
-
-#ifdef __cplusplus
-extern "C" {
-#endif
-
-_LT_EOF
-	  # Now generate the symbol file.
-	  eval "$lt_cv_sys_global_symbol_to_cdecl"' < "$nlist" | $GREP -v main >> conftest.$ac_ext'
-
-	  cat <<_LT_EOF >> conftest.$ac_ext
-
-/* The mapping between symbol names and symbols.  */
-LT@&t@_DLSYM_CONST struct {
-  const char *name;
-  void       *address;
-}
-lt__PROGRAM__LTX_preloaded_symbols[[]] =
-{
-  { "@PROGRAM@", (void *) 0 },
-_LT_EOF
-	  $SED "s/^$symcode$symcode* \(.*\) \(.*\)$/  {\"\2\", (void *) \&\2},/" < "$nlist" | $GREP -v main >> conftest.$ac_ext
-	  cat <<\_LT_EOF >> conftest.$ac_ext
-  {0, (void *) 0}
-};
-
-/* This works around a problem in FreeBSD linker */
-#ifdef FREEBSD_WORKAROUND
-static const void *lt_preloaded_setup() {
-  return lt__PROGRAM__LTX_preloaded_symbols;
-}
-#endif
-
-#ifdef __cplusplus
-}
-#endif
-_LT_EOF
-	  # Now try linking the two files.
-	  mv conftest.$ac_objext conftstm.$ac_objext
-	  lt_globsym_save_LIBS=$LIBS
-	  lt_globsym_save_CFLAGS=$CFLAGS
-	  LIBS="conftstm.$ac_objext"
-	  CFLAGS="$CFLAGS$_LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1)"
-	  if AC_TRY_EVAL(ac_link) && test -s conftest${ac_exeext}; then
-	    pipe_works=yes
-	  fi
-	  LIBS=$lt_globsym_save_LIBS
-	  CFLAGS=$lt_globsym_save_CFLAGS
-	else
-	  echo "cannot find nm_test_func in $nlist" >&AS_MESSAGE_LOG_FD
-	fi
-      else
-	echo "cannot find nm_test_var in $nlist" >&AS_MESSAGE_LOG_FD
-      fi
-    else
-      echo "cannot run $lt_cv_sys_global_symbol_pipe" >&AS_MESSAGE_LOG_FD
-    fi
-  else
-    echo "$progname: failed program was:" >&AS_MESSAGE_LOG_FD
-    cat conftest.$ac_ext >&5
-  fi
-  rm -rf conftest* conftst*
-
-  # Do not use the global_symbol_pipe unless it works.
-  if test "$pipe_works" = yes; then
-    break
-  else
-    lt_cv_sys_global_symbol_pipe=
-  fi
-done
-])
-if test -z "$lt_cv_sys_global_symbol_pipe"; then
-  lt_cv_sys_global_symbol_to_cdecl=
-fi
-if test -z "$lt_cv_sys_global_symbol_pipe$lt_cv_sys_global_symbol_to_cdecl"; then
-  AC_MSG_RESULT(failed)
-else
-  AC_MSG_RESULT(ok)
-fi
-
-# Response file support.
-if test "$lt_cv_nm_interface" = "MS dumpbin"; then
-  nm_file_list_spec='@'
-elif $NM --help 2>/dev/null | grep '[[@]]FILE' >/dev/null; then
-  nm_file_list_spec='@'
-fi
-
-_LT_DECL([global_symbol_pipe], [lt_cv_sys_global_symbol_pipe], [1],
-    [Take the output of nm and produce a listing of raw symbols and C names])
-_LT_DECL([global_symbol_to_cdecl], [lt_cv_sys_global_symbol_to_cdecl], [1],
-    [Transform the output of nm in a proper C declaration])
-_LT_DECL([global_symbol_to_c_name_address],
-    [lt_cv_sys_global_symbol_to_c_name_address], [1],
-    [Transform the output of nm in a C name address pair])
-_LT_DECL([global_symbol_to_c_name_address_lib_prefix],
-    [lt_cv_sys_global_symbol_to_c_name_address_lib_prefix], [1],
-    [Transform the output of nm in a C name address pair when lib prefix is needed])
-_LT_DECL([], [nm_file_list_spec], [1],
-    [Specify filename containing input files for $NM])
-]) # _LT_CMD_GLOBAL_SYMBOLS
-
-
-# _LT_COMPILER_PIC([TAGNAME])
-# ---------------------------
-m4_defun([_LT_COMPILER_PIC],
-[m4_require([_LT_TAG_COMPILER])dnl
-_LT_TAGVAR(lt_prog_compiler_wl, $1)=
-_LT_TAGVAR(lt_prog_compiler_pic, $1)=
-_LT_TAGVAR(lt_prog_compiler_static, $1)=
-
-m4_if([$1], [CXX], [
-  # C++ specific cases for pic, static, wl, etc.
-  if test "$GXX" = yes; then
-    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-    _LT_TAGVAR(lt_prog_compiler_static, $1)='-static'
-
-    case $host_os in
-    aix*)
-      # All AIX code is PIC.
-      if test "$host_cpu" = ia64; then
-	# AIX 5 now supports IA64 processor
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-        ;;
-      m68k)
-            # FIXME: we need at least 68020 code to build shared libraries, but
-            # adding the `-m68020' flag to GCC prevents building anything better,
-            # like `-m68040'.
-            _LT_TAGVAR(lt_prog_compiler_pic, $1)='-m68020 -resident32 -malways-restore-a4'
-        ;;
-      esac
-      ;;
-
-    beos* | irix5* | irix6* | nonstopux* | osf3* | osf4* | osf5*)
-      # PIC is the default for these OSes.
-      ;;
-    mingw* | cygwin* | os2* | pw32* | cegcc*)
-      # This hack is so that the source file can tell whether it is being
-      # built for inclusion in a dll (and should export symbols for example).
-      # Although the cygwin gcc ignores -fPIC, still need this for old-style
-      # (--disable-auto-import) libraries
-      m4_if([$1], [GCJ], [],
-	[_LT_TAGVAR(lt_prog_compiler_pic, $1)='-DDLL_EXPORT'])
-      ;;
-    darwin* | rhapsody*)
-      # PIC is the default on this platform
-      # Common symbols not allowed in MH_DYLIB files
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fno-common'
-      ;;
-    *djgpp*)
-      # DJGPP does not support shared libraries at all
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)=
-      ;;
-    haiku*)
-      # PIC is the default for Haiku.
-      # The "-static" flag exists, but is broken.
-      _LT_TAGVAR(lt_prog_compiler_static, $1)=
-      ;;
-    interix[[3-9]]*)
-      # Interix 3.x gcc -fpic/-fPIC options generate broken code.
-      # Instead, we relocate shared libraries at runtime.
-      ;;
-    sysv4*MP*)
-      if test -d /usr/nec; then
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)=-Kconform_pic
-      fi
-      ;;
-    hpux*)
-      # PIC is the default for 64-bit PA HP-UX, but not for 32-bit
-      # PA HP-UX.  On IA64 HP-UX, PIC is the default but the pic flag
-      # sets the default TLS model and affects inlining.
-      case $host_cpu in
-      hppa*64*)
-	;;
-      *)
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-	;;
-      esac
-      ;;
-    *qnx* | *nto*)
-      # QNX uses GNU C++, but need to define -shared option too, otherwise
-      # it will coredump.
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC -shared'
-      ;;
-    *)
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-      ;;
-    esac
-  else
-    case $host_os in
-      aix[[4-9]]*)
-	# All AIX code is PIC.
-	if test "$host_cpu" = ia64; then
-	  # AIX 5 now supports IA64 processor
-	  _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	else
-	  _LT_TAGVAR(lt_prog_compiler_static, $1)='-bnso -bI:/lib/syscalls.exp'
-	fi
-	;;
-      chorus*)
-	case $cc_basename in
-	cxch68*)
-	  # Green Hills C++ Compiler
-	  # _LT_TAGVAR(lt_prog_compiler_static, $1)="--no_auto_instantiation -u __main -u __premain -u _abort -r $COOL_DIR/lib/libOrb.a $MVME_DIR/lib/CC/libC.a $MVME_DIR/lib/classix/libcx.s.a"
-	  ;;
-	esac
-	;;
-      mingw* | cygwin* | os2* | pw32* | cegcc*)
-	# This hack is so that the source file can tell whether it is being
-	# built for inclusion in a dll (and should export symbols for example).
-	m4_if([$1], [GCJ], [],
-	  [_LT_TAGVAR(lt_prog_compiler_pic, $1)='-DDLL_EXPORT'])
-	;;
-      dgux*)
-	case $cc_basename in
-	  ec++*)
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	    ;;
-	  ghcx*)
-	    # Green Hills C++ Compiler
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-pic'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      freebsd* | dragonfly*)
-	# FreeBSD uses GNU C++
-	;;
-      hpux9* | hpux10* | hpux11*)
-	case $cc_basename in
-	  CC*)
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='${wl}-a ${wl}archive'
-	    if test "$host_cpu" != ia64; then
-	      _LT_TAGVAR(lt_prog_compiler_pic, $1)='+Z'
-	    fi
-	    ;;
-	  aCC*)
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='${wl}-a ${wl}archive'
-	    case $host_cpu in
-	    hppa*64*|ia64*)
-	      # +Z the default
-	      ;;
-	    *)
-	      _LT_TAGVAR(lt_prog_compiler_pic, $1)='+Z'
-	      ;;
-	    esac
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      interix*)
-	# This is c89, which is MS Visual C++ (no shared libs)
-	# Anyone wants to do a port?
-	;;
-      irix5* | irix6* | nonstopux*)
-	case $cc_basename in
-	  CC*)
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-non_shared'
-	    # CC pic flag -KPIC is the default.
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      linux* | k*bsd*-gnu | kopensolaris*-gnu)
-	case $cc_basename in
-	  KCC*)
-	    # KAI C++ Compiler
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='--backend -Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-	    ;;
-	  ecpc* )
-	    # old Intel C++ for x86_64 which still supported -KPIC.
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-static'
-	    ;;
-	  icpc* )
-	    # Intel C++, used to be incompatible with GCC.
-	    # ICC 10 doesn't accept -KPIC any more.
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-static'
-	    ;;
-	  pgCC* | pgcpp*)
-	    # Portland Group C++ compiler
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fpic'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	    ;;
-	  cxx*)
-	    # Compaq C++
-	    # Make sure the PIC flag is empty.  It appears that all Alpha
-	    # Linux and Compaq Tru64 Unix objects are PIC.
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)=
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-non_shared'
-	    ;;
-	  xlc* | xlC* | bgxl[[cC]]* | mpixl[[cC]]*)
-	    # IBM XL 8.0, 9.0 on PPC and BlueGene
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-qpic'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-qstaticlink'
-	    ;;
-	  *)
-	    case `$CC -V 2>&1 | sed 5q` in
-	    *Sun\ C*)
-	      # Sun C++ 5.9
-	      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	      _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Qoption ld '
-	      ;;
-	    esac
-	    ;;
-	esac
-	;;
-      lynxos*)
-	;;
-      m88k*)
-	;;
-      mvs*)
-	case $cc_basename in
-	  cxx*)
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-W c,exportall'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      netbsd*)
-	;;
-      *qnx* | *nto*)
-        # QNX uses GNU C++, but need to define -shared option too, otherwise
-        # it will coredump.
-        _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC -shared'
-        ;;
-      osf3* | osf4* | osf5*)
-	case $cc_basename in
-	  KCC*)
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='--backend -Wl,'
-	    ;;
-	  RCC*)
-	    # Rational C++ 2.4.1
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-pic'
-	    ;;
-	  cxx*)
-	    # Digital/Compaq C++
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    # Make sure the PIC flag is empty.  It appears that all Alpha
-	    # Linux and Compaq Tru64 Unix objects are PIC.
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)=
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-non_shared'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      psos*)
-	;;
-      solaris*)
-	case $cc_basename in
-	  CC* | sunCC*)
-	    # Sun C++ 4.2, 5.x and Centerline C++
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Qoption ld '
-	    ;;
-	  gcx*)
-	    # Green Hills C++ Compiler
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-PIC'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      sunos4*)
-	case $cc_basename in
-	  CC*)
-	    # Sun C++ 4.x
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-pic'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	    ;;
-	  lcc*)
-	    # Lucid
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-pic'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      sysv5* | unixware* | sco3.2v5* | sco5v6* | OpenUNIX*)
-	case $cc_basename in
-	  CC*)
-	    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	    _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	    ;;
-	esac
-	;;
-      tandem*)
-	case $cc_basename in
-	  NCC*)
-	    # NonStop-UX NCC 3.20
-	    _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	    ;;
-	  *)
-	    ;;
-	esac
-	;;
-      vxworks*)
-	;;
-      *)
-	_LT_TAGVAR(lt_prog_compiler_can_build_shared, $1)=no
-	;;
-    esac
-  fi
-],
-[
-  if test "$GCC" = yes; then
-    _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-    _LT_TAGVAR(lt_prog_compiler_static, $1)='-static'
-
-    case $host_os in
-      aix*)
-      # All AIX code is PIC.
-      if test "$host_cpu" = ia64; then
-	# AIX 5 now supports IA64 processor
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-        ;;
-      m68k)
-            # FIXME: we need at least 68020 code to build shared libraries, but
-            # adding the `-m68020' flag to GCC prevents building anything better,
-            # like `-m68040'.
-            _LT_TAGVAR(lt_prog_compiler_pic, $1)='-m68020 -resident32 -malways-restore-a4'
-        ;;
-      esac
-      ;;
-
-    beos* | irix5* | irix6* | nonstopux* | osf3* | osf4* | osf5*)
-      # PIC is the default for these OSes.
-      ;;
-
-    mingw* | cygwin* | pw32* | os2* | cegcc*)
-      # This hack is so that the source file can tell whether it is being
-      # built for inclusion in a dll (and should export symbols for example).
-      # Although the cygwin gcc ignores -fPIC, still need this for old-style
-      # (--disable-auto-import) libraries
-      m4_if([$1], [GCJ], [],
-	[_LT_TAGVAR(lt_prog_compiler_pic, $1)='-DDLL_EXPORT'])
-      ;;
-
-    darwin* | rhapsody*)
-      # PIC is the default on this platform
-      # Common symbols not allowed in MH_DYLIB files
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fno-common'
-      ;;
-
-    haiku*)
-      # PIC is the default for Haiku.
-      # The "-static" flag exists, but is broken.
-      _LT_TAGVAR(lt_prog_compiler_static, $1)=
-      ;;
-
-    hpux*)
-      # PIC is the default for 64-bit PA HP-UX, but not for 32-bit
-      # PA HP-UX.  On IA64 HP-UX, PIC is the default but the pic flag
-      # sets the default TLS model and affects inlining.
-      case $host_cpu in
-      hppa*64*)
-	# +Z the default
-	;;
-      *)
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-	;;
-      esac
-      ;;
-
-    interix[[3-9]]*)
-      # Interix 3.x gcc -fpic/-fPIC options generate broken code.
-      # Instead, we relocate shared libraries at runtime.
-      ;;
-
-    msdosdjgpp*)
-      # Just because we use GCC doesn't mean we suddenly get shared libraries
-      # on systems that don't support them.
-      _LT_TAGVAR(lt_prog_compiler_can_build_shared, $1)=no
-      enable_shared=no
-      ;;
-
-    *nto* | *qnx*)
-      # QNX uses GNU C++, but need to define -shared option too, otherwise
-      # it will coredump.
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC -shared'
-      ;;
-
-    sysv4*MP*)
-      if test -d /usr/nec; then
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)=-Kconform_pic
-      fi
-      ;;
-
-    *)
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-      ;;
-    esac
-
-    case $cc_basename in
-    nvcc*) # Cuda Compiler Driver 2.2
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Xlinker '
-      if test -n "$_LT_TAGVAR(lt_prog_compiler_pic, $1)"; then
-        _LT_TAGVAR(lt_prog_compiler_pic, $1)="-Xcompiler $_LT_TAGVAR(lt_prog_compiler_pic, $1)"
-      fi
-      ;;
-    esac
-  else
-    # PORTME Check for flag to pass linker flags through the system compiler.
-    case $host_os in
-    aix*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-      if test "$host_cpu" = ia64; then
-	# AIX 5 now supports IA64 processor
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      else
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-bnso -bI:/lib/syscalls.exp'
-      fi
-      ;;
-
-    mingw* | cygwin* | pw32* | os2* | cegcc*)
-      # This hack is so that the source file can tell whether it is being
-      # built for inclusion in a dll (and should export symbols for example).
-      m4_if([$1], [GCJ], [],
-	[_LT_TAGVAR(lt_prog_compiler_pic, $1)='-DDLL_EXPORT'])
-      ;;
-
-    hpux9* | hpux10* | hpux11*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-      # PIC is the default for IA64 HP-UX and 64-bit HP-UX, but
-      # not for PA HP-UX.
-      case $host_cpu in
-      hppa*64*|ia64*)
-	# +Z the default
-	;;
-      *)
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='+Z'
-	;;
-      esac
-      # Is there a better lt_prog_compiler_static that works with the bundled CC?
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='${wl}-a ${wl}archive'
-      ;;
-
-    irix5* | irix6* | nonstopux*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-      # PIC (with -KPIC) is the default.
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-non_shared'
-      ;;
-
-    linux* | k*bsd*-gnu | kopensolaris*-gnu)
-      case $cc_basename in
-      # old Intel for x86_64 which still supported -KPIC.
-      ecc*)
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-static'
-        ;;
-      # icc used to be incompatible with GCC.
-      # ICC 10 doesn't accept -KPIC any more.
-      icc* | ifort*)
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-static'
-        ;;
-      # Lahey Fortran 8.1.
-      lf95*)
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='--shared'
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='--static'
-	;;
-      nagfor*)
-	# NAG Fortran compiler
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,-Wl,,'
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-PIC'
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	;;
-      pgcc* | pgf77* | pgf90* | pgf95* | pgfortran*)
-        # Portland Group compilers (*not* the Pentium gcc compiler,
-	# which looks to be a dead project)
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-fpic'
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-        ;;
-      ccc*)
-        _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-        # All Alpha code is PIC.
-        _LT_TAGVAR(lt_prog_compiler_static, $1)='-non_shared'
-        ;;
-      xl* | bgxl* | bgf* | mpixl*)
-	# IBM XL C 8.0/Fortran 10.1, 11.1 on PPC and BlueGene
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-qpic'
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-qstaticlink'
-	;;
-      *)
-	case `$CC -V 2>&1 | sed 5q` in
-	*Sun\ Ceres\ Fortran* | *Sun*Fortran*\ [[1-7]].* | *Sun*Fortran*\ 8.[[0-3]]*)
-	  # Sun Fortran 8.3 passes all unrecognized flags to the linker
-	  _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	  _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	  _LT_TAGVAR(lt_prog_compiler_wl, $1)=''
-	  ;;
-	*Sun\ F* | *Sun*Fortran*)
-	  _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	  _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	  _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Qoption ld '
-	  ;;
-	*Sun\ C*)
-	  # Sun C 5.9
-	  _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-	  _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	  _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	  ;;
-        *Intel*\ [[CF]]*Compiler*)
-	  _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	  _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC'
-	  _LT_TAGVAR(lt_prog_compiler_static, $1)='-static'
-	  ;;
-	*Portland\ Group*)
-	  _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-	  _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fpic'
-	  _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-	  ;;
-	esac
-	;;
-      esac
-      ;;
-
-    newsos6)
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      ;;
-
-    *nto* | *qnx*)
-      # QNX uses GNU C++, but need to define -shared option too, otherwise
-      # it will coredump.
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-fPIC -shared'
-      ;;
-
-    osf3* | osf4* | osf5*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-      # All OSF/1 code is PIC.
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-non_shared'
-      ;;
-
-    rdos*)
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-non_shared'
-      ;;
-
-    solaris*)
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      case $cc_basename in
-      f77* | f90* | f95* | sunf77* | sunf90* | sunf95*)
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Qoption ld ';;
-      *)
-	_LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,';;
-      esac
-      ;;
-
-    sunos4*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Qoption ld '
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-PIC'
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      ;;
-
-    sysv4 | sysv4.2uw2* | sysv4.3*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      ;;
-
-    sysv4*MP*)
-      if test -d /usr/nec ;then
-	_LT_TAGVAR(lt_prog_compiler_pic, $1)='-Kconform_pic'
-	_LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      fi
-      ;;
-
-    sysv5* | unixware* | sco3.2v5* | sco5v6* | OpenUNIX*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-KPIC'
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      ;;
-
-    unicos*)
-      _LT_TAGVAR(lt_prog_compiler_wl, $1)='-Wl,'
-      _LT_TAGVAR(lt_prog_compiler_can_build_shared, $1)=no
-      ;;
-
-    uts4*)
-      _LT_TAGVAR(lt_prog_compiler_pic, $1)='-pic'
-      _LT_TAGVAR(lt_prog_compiler_static, $1)='-Bstatic'
-      ;;
-
-    *)
-      _LT_TAGVAR(lt_prog_compiler_can_build_shared, $1)=no
-      ;;
-    esac
-  fi
-])
-case $host_os in
-  # For platforms which do not support PIC, -DPIC is meaningless:
-  *djgpp*)
-    _LT_TAGVAR(lt_prog_compiler_pic, $1)=
-    ;;
-  *)
-    _LT_TAGVAR(lt_prog_compiler_pic, $1)="$_LT_TAGVAR(lt_prog_compiler_pic, $1)@&t@m4_if([$1],[],[ -DPIC],[m4_if([$1],[CXX],[ -DPIC],[])])"
-    ;;
-esac
-
-AC_CACHE_CHECK([for $compiler option to produce PIC],
-  [_LT_TAGVAR(lt_cv_prog_compiler_pic, $1)],
-  [_LT_TAGVAR(lt_cv_prog_compiler_pic, $1)=$_LT_TAGVAR(lt_prog_compiler_pic, $1)])
-_LT_TAGVAR(lt_prog_compiler_pic, $1)=$_LT_TAGVAR(lt_cv_prog_compiler_pic, $1)
-
-#
-# Check to make sure the PIC flag actually works.
-#
-if test -n "$_LT_TAGVAR(lt_prog_compiler_pic, $1)"; then
-  _LT_COMPILER_OPTION([if $compiler PIC flag $_LT_TAGVAR(lt_prog_compiler_pic, $1) works],
-    [_LT_TAGVAR(lt_cv_prog_compiler_pic_works, $1)],
-    [$_LT_TAGVAR(lt_prog_compiler_pic, $1)@&t@m4_if([$1],[],[ -DPIC],[m4_if([$1],[CXX],[ -DPIC],[])])], [],
-    [case $_LT_TAGVAR(lt_prog_compiler_pic, $1) in
-     "" | " "*) ;;
-     *) _LT_TAGVAR(lt_prog_compiler_pic, $1)=" $_LT_TAGVAR(lt_prog_compiler_pic, $1)" ;;
-     esac],
-    [_LT_TAGVAR(lt_prog_compiler_pic, $1)=
-     _LT_TAGVAR(lt_prog_compiler_can_build_shared, $1)=no])
-fi
-_LT_TAGDECL([pic_flag], [lt_prog_compiler_pic], [1],
-	[Additional compiler flags for building library objects])
-
-_LT_TAGDECL([wl], [lt_prog_compiler_wl], [1],
-	[How to pass a linker flag through the compiler])
-#
-# Check to make sure the static flag actually works.
-#
-wl=$_LT_TAGVAR(lt_prog_compiler_wl, $1) eval lt_tmp_static_flag=\"$_LT_TAGVAR(lt_prog_compiler_static, $1)\"
-_LT_LINKER_OPTION([if $compiler static flag $lt_tmp_static_flag works],
-  _LT_TAGVAR(lt_cv_prog_compiler_static_works, $1),
-  $lt_tmp_static_flag,
-  [],
-  [_LT_TAGVAR(lt_prog_compiler_static, $1)=])
-_LT_TAGDECL([link_static_flag], [lt_prog_compiler_static], [1],
-	[Compiler flag to prevent dynamic linking])
-])# _LT_COMPILER_PIC
-
-
-# _LT_LINKER_SHLIBS([TAGNAME])
-# ----------------------------
-# See if the linker supports building shared libraries.
-m4_defun([_LT_LINKER_SHLIBS],
-[AC_REQUIRE([LT_PATH_LD])dnl
-AC_REQUIRE([LT_PATH_NM])dnl
-m4_require([_LT_PATH_MANIFEST_TOOL])dnl
-m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-m4_require([_LT_DECL_EGREP])dnl
-m4_require([_LT_DECL_SED])dnl
-m4_require([_LT_CMD_GLOBAL_SYMBOLS])dnl
-m4_require([_LT_TAG_COMPILER])dnl
-AC_MSG_CHECKING([whether the $compiler linker ($LD) supports shared libraries])
-m4_if([$1], [CXX], [
-  _LT_TAGVAR(export_symbols_cmds, $1)='$NM $libobjs $convenience | $global_symbol_pipe | $SED '\''s/.* //'\'' | sort | uniq > $export_symbols'
-  _LT_TAGVAR(exclude_expsyms, $1)=['_GLOBAL_OFFSET_TABLE_|_GLOBAL__F[ID]_.*']
-  case $host_os in
-  aix[[4-9]]*)
-    # If we're using GNU nm, then we don't want the "-C" option.
-    # -C means demangle to AIX nm, but means don't demangle with GNU nm
-    # Also, AIX nm treats weak defined symbols like other global defined
-    # symbols, whereas GNU nm marks them as "W".
-    if $NM -V 2>&1 | $GREP 'GNU' > /dev/null; then
-      _LT_TAGVAR(export_symbols_cmds, $1)='$NM -Bpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B") || (\$ 2 == "W")) && ([substr](\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-    else
-      _LT_TAGVAR(export_symbols_cmds, $1)='$NM -BCpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B")) && ([substr](\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-    fi
-    ;;
-  pw32*)
-    _LT_TAGVAR(export_symbols_cmds, $1)="$ltdll_cmds"
-    ;;
-  cygwin* | mingw* | cegcc*)
-    case $cc_basename in
-    cl*)
-      _LT_TAGVAR(exclude_expsyms, $1)='_NULL_IMPORT_DESCRIPTOR|_IMPORT_DESCRIPTOR_.*'
-      ;;
-    *)
-      _LT_TAGVAR(export_symbols_cmds, $1)='$NM $libobjs $convenience | $global_symbol_pipe | $SED -e '\''/^[[BCDGRS]][[ ]]/s/.*[[ ]]\([[^ ]]*\)/\1 DATA/;s/^.*[[ ]]__nm__\([[^ ]]*\)[[ ]][[^ ]]*/\1 DATA/;/^I[[ ]]/d;/^[[AITW]][[ ]]/s/.* //'\'' | sort | uniq > $export_symbols'
-      _LT_TAGVAR(exclude_expsyms, $1)=['[_]+GLOBAL_OFFSET_TABLE_|[_]+GLOBAL__[FID]_.*|[_]+head_[A-Za-z0-9_]+_dll|[A-Za-z0-9_]+_dll_iname']
-      ;;
-    esac
-    ;;
-  *)
-    _LT_TAGVAR(export_symbols_cmds, $1)='$NM $libobjs $convenience | $global_symbol_pipe | $SED '\''s/.* //'\'' | sort | uniq > $export_symbols'
-    ;;
-  esac
-], [
-  runpath_var=
-  _LT_TAGVAR(allow_undefined_flag, $1)=
-  _LT_TAGVAR(always_export_symbols, $1)=no
-  _LT_TAGVAR(archive_cmds, $1)=
-  _LT_TAGVAR(archive_expsym_cmds, $1)=
-  _LT_TAGVAR(compiler_needs_object, $1)=no
-  _LT_TAGVAR(enable_shared_with_static_runtimes, $1)=no
-  _LT_TAGVAR(export_dynamic_flag_spec, $1)=
-  _LT_TAGVAR(export_symbols_cmds, $1)='$NM $libobjs $convenience | $global_symbol_pipe | $SED '\''s/.* //'\'' | sort | uniq > $export_symbols'
-  _LT_TAGVAR(hardcode_automatic, $1)=no
-  _LT_TAGVAR(hardcode_direct, $1)=no
-  _LT_TAGVAR(hardcode_direct_absolute, $1)=no
-  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)=
-  _LT_TAGVAR(hardcode_libdir_separator, $1)=
-  _LT_TAGVAR(hardcode_minus_L, $1)=no
-  _LT_TAGVAR(hardcode_shlibpath_var, $1)=unsupported
-  _LT_TAGVAR(inherit_rpath, $1)=no
-  _LT_TAGVAR(link_all_deplibs, $1)=unknown
-  _LT_TAGVAR(module_cmds, $1)=
-  _LT_TAGVAR(module_expsym_cmds, $1)=
-  _LT_TAGVAR(old_archive_from_new_cmds, $1)=
-  _LT_TAGVAR(old_archive_from_expsyms_cmds, $1)=
-  _LT_TAGVAR(thread_safe_flag_spec, $1)=
-  _LT_TAGVAR(whole_archive_flag_spec, $1)=
-  # include_expsyms should be a list of space-separated symbols to be *always*
-  # included in the symbol list
-  _LT_TAGVAR(include_expsyms, $1)=
-  # exclude_expsyms can be an extended regexp of symbols to exclude
-  # it will be wrapped by ` (' and `)$', so one must not match beginning or
-  # end of line.  Example: `a|bc|.*d.*' will exclude the symbols `a' and `bc',
-  # as well as any symbol that contains `d'.
-  _LT_TAGVAR(exclude_expsyms, $1)=['_GLOBAL_OFFSET_TABLE_|_GLOBAL__F[ID]_.*']
-  # Although _GLOBAL_OFFSET_TABLE_ is a valid symbol C name, most a.out
-  # platforms (ab)use it in PIC code, but their linkers get confused if
-  # the symbol is explicitly referenced.  Since portable code cannot
-  # rely on this symbol name, it's probably fine to never include it in
-  # preloaded symbol tables.
-  # Exclude shared library initialization/finalization symbols.
-dnl Note also adjust exclude_expsyms for C++ above.
-  extract_expsyms_cmds=
-
-  case $host_os in
-  cygwin* | mingw* | pw32* | cegcc*)
-    # FIXME: the MSVC++ port hasn't been tested in a loooong time
-    # When not using gcc, we currently assume that we are using
-    # Microsoft Visual C++.
-    if test "$GCC" != yes; then
-      with_gnu_ld=no
-    fi
-    ;;
-  interix*)
-    # we just hope/assume this is gcc and not c89 (= MSVC++)
-    with_gnu_ld=yes
-    ;;
-  openbsd*)
-    with_gnu_ld=no
-    ;;
-  esac
-
-  _LT_TAGVAR(ld_shlibs, $1)=yes
-
-  # On some targets, GNU ld is compatible enough with the native linker
-  # that we're better off using the native interface for both.
-  lt_use_gnu_ld_interface=no
-  if test "$with_gnu_ld" = yes; then
-    case $host_os in
-      aix*)
-	# The AIX port of GNU ld has always aspired to compatibility
-	# with the native linker.  However, as the warning in the GNU ld
-	# block says, versions before 2.19.5* couldn't really create working
-	# shared libraries, regardless of the interface used.
-	case `$LD -v 2>&1` in
-	  *\ \(GNU\ Binutils\)\ 2.19.5*) ;;
-	  *\ \(GNU\ Binutils\)\ 2.[[2-9]]*) ;;
-	  *\ \(GNU\ Binutils\)\ [[3-9]]*) ;;
-	  *)
-	    lt_use_gnu_ld_interface=yes
-	    ;;
-	esac
-	;;
-      *)
-	lt_use_gnu_ld_interface=yes
-	;;
-    esac
-  fi
-
-  if test "$lt_use_gnu_ld_interface" = yes; then
-    # If archive_cmds runs LD, not CC, wlarc should be empty
-    wlarc='${wl}'
-
-    # Set some defaults for GNU ld with shared library support. These
-    # are reset later if shared libraries are not supported. Putting them
-    # here allows them to be overridden if necessary.
-    runpath_var=LD_RUN_PATH
-    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-    _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-dynamic'
-    # ancient GNU ld didn't support --whole-archive et. al.
-    if $LD --help 2>&1 | $GREP 'no-whole-archive' > /dev/null; then
-      _LT_TAGVAR(whole_archive_flag_spec, $1)="$wlarc"'--whole-archive$convenience '"$wlarc"'--no-whole-archive'
-    else
-      _LT_TAGVAR(whole_archive_flag_spec, $1)=
-    fi
-    supports_anon_versioning=no
-    case `$LD -v 2>&1` in
-      *GNU\ gold*) supports_anon_versioning=yes ;;
-      *\ [[01]].* | *\ 2.[[0-9]].* | *\ 2.10.*) ;; # catch versions < 2.11
-      *\ 2.11.93.0.2\ *) supports_anon_versioning=yes ;; # RH7.3 ...
-      *\ 2.11.92.0.12\ *) supports_anon_versioning=yes ;; # Mandrake 8.2 ...
-      *\ 2.11.*) ;; # other 2.11 versions
-      *) supports_anon_versioning=yes ;;
-    esac
-
-    # See if GNU ld supports shared libraries.
-    case $host_os in
-    aix[[3-9]]*)
-      # On AIX/PPC, the GNU linker is very broken
-      if test "$host_cpu" != ia64; then
-	_LT_TAGVAR(ld_shlibs, $1)=no
-	cat <<_LT_EOF 1>&2
-
-*** Warning: the GNU linker, at least up to release 2.19, is reported
-*** to be unable to reliably create shared libraries on AIX.
-*** Therefore, libtool is disabling shared libraries support.  If you
-*** really care for shared libraries, you may want to install binutils
-*** 2.20 or above, or modify your PATH so that a non-GNU linker is found.
-*** You will then need to restart the configuration process.
-
-_LT_EOF
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            _LT_TAGVAR(archive_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-            _LT_TAGVAR(archive_expsym_cmds, $1)=''
-        ;;
-      m68k)
-            _LT_TAGVAR(archive_cmds, $1)='$RM $output_objdir/a2ixlibrary.data~$ECHO "#define NAME $libname" > $output_objdir/a2ixlibrary.data~$ECHO "#define LIBRARY_ID 1" >> $output_objdir/a2ixlibrary.data~$ECHO "#define VERSION $major" >> $output_objdir/a2ixlibrary.data~$ECHO "#define REVISION $revision" >> $output_objdir/a2ixlibrary.data~$AR $AR_FLAGS $lib $libobjs~$RANLIB $lib~(cd $output_objdir && a2ixlibrary -32)'
-            _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-            _LT_TAGVAR(hardcode_minus_L, $1)=yes
-        ;;
-      esac
-      ;;
-
-    beos*)
-      if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	_LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-	# Joseph Beckenbach <jrb3@best.com> says some releases of gcc
-	# support --undefined.  This deserves some investigation.  FIXME
-	_LT_TAGVAR(archive_cmds, $1)='$CC -nostart $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-      else
-	_LT_TAGVAR(ld_shlibs, $1)=no
-      fi
-      ;;
-
-    cygwin* | mingw* | pw32* | cegcc*)
-      # _LT_TAGVAR(hardcode_libdir_flag_spec, $1) is actually meaningless,
-      # as there is no search path for DLLs.
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-all-symbols'
-      _LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-      _LT_TAGVAR(always_export_symbols, $1)=no
-      _LT_TAGVAR(enable_shared_with_static_runtimes, $1)=yes
-      _LT_TAGVAR(export_symbols_cmds, $1)='$NM $libobjs $convenience | $global_symbol_pipe | $SED -e '\''/^[[BCDGRS]][[ ]]/s/.*[[ ]]\([[^ ]]*\)/\1 DATA/;s/^.*[[ ]]__nm__\([[^ ]]*\)[[ ]][[^ ]]*/\1 DATA/;/^I[[ ]]/d;/^[[AITW]][[ ]]/s/.* //'\'' | sort | uniq > $export_symbols'
-      _LT_TAGVAR(exclude_expsyms, $1)=['[_]+GLOBAL_OFFSET_TABLE_|[_]+GLOBAL__[FID]_.*|[_]+head_[A-Za-z0-9_]+_dll|[A-Za-z0-9_]+_dll_iname']
-
-      if $LD --help 2>&1 | $GREP 'auto-import' > /dev/null; then
-        _LT_TAGVAR(archive_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-	# If the export-symbols file already is a .def file (1st line
-	# is EXPORTS), use it as is; otherwise, prepend...
-	_LT_TAGVAR(archive_expsym_cmds, $1)='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	  cp $export_symbols $output_objdir/$soname.def;
-	else
-	  echo EXPORTS > $output_objdir/$soname.def;
-	  cat $export_symbols >> $output_objdir/$soname.def;
-	fi~
-	$CC -shared $output_objdir/$soname.def $libobjs $deplibs $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-      else
-	_LT_TAGVAR(ld_shlibs, $1)=no
-      fi
-      ;;
-
-    haiku*)
-      _LT_TAGVAR(archive_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-      _LT_TAGVAR(link_all_deplibs, $1)=yes
-      ;;
-
-    interix[[3-9]]*)
-      _LT_TAGVAR(hardcode_direct, $1)=no
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-      # Hack: On Interix 3.x, we cannot compile PIC because of a broken gcc.
-      # Instead, shared libraries are loaded at an image base (0x10000000 by
-      # default) and relocated if they conflict, which is a slow very memory
-      # consuming and fragmenting process.  To avoid this, we pick a random,
-      # 256 KiB-aligned image base between 0x50000000 and 0x6FFC0000 at link
-      # time.  Moving up from 0x10000000 also allows more sbrk(2) space.
-      _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-      _LT_TAGVAR(archive_expsym_cmds, $1)='sed "s,^,_," $export_symbols >$output_objdir/$soname.expsym~$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--retain-symbols-file,$output_objdir/$soname.expsym ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-      ;;
-
-    gnu* | linux* | tpf* | k*bsd*-gnu | kopensolaris*-gnu)
-      tmp_diet=no
-      if test "$host_os" = linux-dietlibc; then
-	case $cc_basename in
-	  diet\ *) tmp_diet=yes;;	# linux-dietlibc with static linking (!diet-dyn)
-	esac
-      fi
-      if $LD --help 2>&1 | $EGREP ': supported targets:.* elf' > /dev/null \
-	 && test "$tmp_diet" = no
-      then
-	tmp_addflag=' $pic_flag'
-	tmp_sharedflag='-shared'
-	case $cc_basename,$host_cpu in
-        pgcc*)				# Portland Group C compiler
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  tmp_addflag=' $pic_flag'
-	  ;;
-	pgf77* | pgf90* | pgf95* | pgfortran*)
-					# Portland Group f77 and f90 compilers
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  tmp_addflag=' $pic_flag -Mnomain' ;;
-	ecc*,ia64* | icc*,ia64*)	# Intel C compiler on ia64
-	  tmp_addflag=' -i_dynamic' ;;
-	efc*,ia64* | ifort*,ia64*)	# Intel Fortran compiler on ia64
-	  tmp_addflag=' -i_dynamic -nofor_main' ;;
-	ifc* | ifort*)			# Intel Fortran compiler
-	  tmp_addflag=' -nofor_main' ;;
-	lf95*)				# Lahey Fortran 8.1
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)=
-	  tmp_sharedflag='--shared' ;;
-	xl[[cC]]* | bgxl[[cC]]* | mpixl[[cC]]*) # IBM XL C 8.0 on PPC (deal with xlf below)
-	  tmp_sharedflag='-qmkshrobj'
-	  tmp_addflag= ;;
-	nvcc*)	# Cuda Compiler Driver 2.2
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  _LT_TAGVAR(compiler_needs_object, $1)=yes
-	  ;;
-	esac
-	case `$CC -V 2>&1 | sed 5q` in
-	*Sun\ C*)			# Sun C 5.9
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive`new_convenience=; for conv in $convenience\"\"; do test -z \"$conv\" || new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	  _LT_TAGVAR(compiler_needs_object, $1)=yes
-	  tmp_sharedflag='-G' ;;
-	*Sun\ F*)			# Sun Fortran 8.3
-	  tmp_sharedflag='-G' ;;
-	esac
-	_LT_TAGVAR(archive_cmds, $1)='$CC '"$tmp_sharedflag""$tmp_addflag"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-
-        if test "x$supports_anon_versioning" = xyes; then
-          _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $output_objdir/$libname.ver~
-	    cat $export_symbols | sed -e "s/\(.*\)/\1;/" >> $output_objdir/$libname.ver~
-	    echo "local: *; };" >> $output_objdir/$libname.ver~
-	    $CC '"$tmp_sharedflag""$tmp_addflag"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-version-script ${wl}$output_objdir/$libname.ver -o $lib'
-        fi
-
-	case $cc_basename in
-	xlf* | bgf* | bgxlf* | mpixlf*)
-	  # IBM XL Fortran 10.1 on PPC cannot create shared libs itself
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)='--whole-archive$convenience --no-whole-archive'
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-	  _LT_TAGVAR(archive_cmds, $1)='$LD -shared $libobjs $deplibs $linker_flags -soname $soname -o $lib'
-	  if test "x$supports_anon_versioning" = xyes; then
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $output_objdir/$libname.ver~
-	      cat $export_symbols | sed -e "s/\(.*\)/\1;/" >> $output_objdir/$libname.ver~
-	      echo "local: *; };" >> $output_objdir/$libname.ver~
-	      $LD -shared $libobjs $deplibs $linker_flags -soname $soname -version-script $output_objdir/$libname.ver -o $lib'
-	  fi
-	  ;;
-	esac
-      else
-        _LT_TAGVAR(ld_shlibs, $1)=no
-      fi
-      ;;
-
-    netbsd*)
-      if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-	_LT_TAGVAR(archive_cmds, $1)='$LD -Bshareable $libobjs $deplibs $linker_flags -o $lib'
-	wlarc=
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-      fi
-      ;;
-
-    solaris*)
-      if $LD -v 2>&1 | $GREP 'BFD 2\.8' > /dev/null; then
-	_LT_TAGVAR(ld_shlibs, $1)=no
-	cat <<_LT_EOF 1>&2
-
-*** Warning: The releases 2.8.* of the GNU linker cannot reliably
-*** create shared libraries on Solaris systems.  Therefore, libtool
-*** is disabling shared libraries support.  We urge you to upgrade GNU
-*** binutils to release 2.9.1 or newer.  Another option is to modify
-*** your PATH or compiler configuration so that the native linker is
-*** used, and then restart.
-
-_LT_EOF
-      elif $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-      else
-	_LT_TAGVAR(ld_shlibs, $1)=no
-      fi
-      ;;
-
-    sysv5* | sco3.2v5* | sco5v6* | unixware* | OpenUNIX*)
-      case `$LD -v 2>&1` in
-        *\ [[01]].* | *\ 2.[[0-9]].* | *\ 2.1[[0-5]].*)
-	_LT_TAGVAR(ld_shlibs, $1)=no
-	cat <<_LT_EOF 1>&2
-
-*** Warning: Releases of the GNU linker prior to 2.16.91.0.3 can not
-*** reliably create shared libraries on SCO systems.  Therefore, libtool
-*** is disabling shared libraries support.  We urge you to upgrade GNU
-*** binutils to release 2.16.91.0.3 or newer.  Another option is to modify
-*** your PATH or compiler configuration so that the native linker is
-*** used, and then restart.
-
-_LT_EOF
-	;;
-	*)
-	  # For security reasons, it is highly recommended that you always
-	  # use absolute paths for naming shared libraries, and exclude the
-	  # DT_RUNPATH tag from executables and libraries.  But doing so
-	  # requires that you compile everything twice, which is a pain.
-	  if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-	  else
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	  fi
-	;;
-      esac
-      ;;
-
-    sunos4*)
-      _LT_TAGVAR(archive_cmds, $1)='$LD -assert pure-text -Bshareable -o $lib $libobjs $deplibs $linker_flags'
-      wlarc=
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    *)
-      if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-      else
-	_LT_TAGVAR(ld_shlibs, $1)=no
-      fi
-      ;;
-    esac
-
-    if test "$_LT_TAGVAR(ld_shlibs, $1)" = no; then
-      runpath_var=
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)=
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)=
-      _LT_TAGVAR(whole_archive_flag_spec, $1)=
-    fi
-  else
-    # PORTME fill in a description of your system's linker (not GNU ld)
-    case $host_os in
-    aix3*)
-      _LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-      _LT_TAGVAR(always_export_symbols, $1)=yes
-      _LT_TAGVAR(archive_expsym_cmds, $1)='$LD -o $output_objdir/$soname $libobjs $deplibs $linker_flags -bE:$export_symbols -T512 -H512 -bM:SRE~$AR $AR_FLAGS $lib $output_objdir/$soname'
-      # Note: this linker hardcodes the directories in LIBPATH if there
-      # are no directories specified by -L.
-      _LT_TAGVAR(hardcode_minus_L, $1)=yes
-      if test "$GCC" = yes && test -z "$lt_prog_compiler_static"; then
-	# Neither direct hardcoding nor static linking is supported with a
-	# broken collect2.
-	_LT_TAGVAR(hardcode_direct, $1)=unsupported
-      fi
-      ;;
-
-    aix[[4-9]]*)
-      if test "$host_cpu" = ia64; then
-	# On IA64, the linker does run time linking by default, so we don't
-	# have to do anything special.
-	aix_use_runtimelinking=no
-	exp_sym_flag='-Bexport'
-	no_entry_flag=""
-      else
-	# If we're using GNU nm, then we don't want the "-C" option.
-	# -C means demangle to AIX nm, but means don't demangle with GNU nm
-	# Also, AIX nm treats weak defined symbols like other global
-	# defined symbols, whereas GNU nm marks them as "W".
-	if $NM -V 2>&1 | $GREP 'GNU' > /dev/null; then
-	  _LT_TAGVAR(export_symbols_cmds, $1)='$NM -Bpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B") || (\$ 2 == "W")) && ([substr](\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-	else
-	  _LT_TAGVAR(export_symbols_cmds, $1)='$NM -BCpg $libobjs $convenience | awk '\''{ if (((\$ 2 == "T") || (\$ 2 == "D") || (\$ 2 == "B")) && ([substr](\$ 3,1,1) != ".")) { print \$ 3 } }'\'' | sort -u > $export_symbols'
-	fi
-	aix_use_runtimelinking=no
-
-	# Test if we are trying to use run time linking or normal
-	# AIX style linking. If -brtl is somewhere in LDFLAGS, we
-	# need to do runtime linking.
-	case $host_os in aix4.[[23]]|aix4.[[23]].*|aix[[5-9]]*)
-	  for ld_flag in $LDFLAGS; do
-	  if (test $ld_flag = "-brtl" || test $ld_flag = "-Wl,-brtl"); then
-	    aix_use_runtimelinking=yes
-	    break
-	  fi
-	  done
-	  ;;
-	esac
-
-	exp_sym_flag='-bexport'
-	no_entry_flag='-bnoentry'
-      fi
-
-      # When large executables or shared objects are built, AIX ld can
-      # have problems creating the table of contents.  If linking a library
-      # or program results in "error TOC overflow" add -mminimal-toc to
-      # CXXFLAGS/CFLAGS for g++/gcc.  In the cases where that is not
-      # enough to fix the problem, add -Wl,-bbigtoc to LDFLAGS.
-
-      _LT_TAGVAR(archive_cmds, $1)=''
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_direct_absolute, $1)=yes
-      _LT_TAGVAR(hardcode_libdir_separator, $1)=':'
-      _LT_TAGVAR(link_all_deplibs, $1)=yes
-      _LT_TAGVAR(file_list_spec, $1)='${wl}-f,'
-
-      if test "$GCC" = yes; then
-	case $host_os in aix4.[[012]]|aix4.[[012]].*)
-	# We only want to do this on AIX 4.2 and lower, the check
-	# below for broken collect2 doesn't work under 4.3+
-	  collect2name=`${CC} -print-prog-name=collect2`
-	  if test -f "$collect2name" &&
-	   strings "$collect2name" | $GREP resolve_lib_name >/dev/null
-	  then
-	  # We have reworked collect2
-	  :
-	  else
-	  # We have old collect2
-	  _LT_TAGVAR(hardcode_direct, $1)=unsupported
-	  # It fails to find uninstalled libraries when the uninstalled
-	  # path is not listed in the libpath.  Setting hardcode_minus_L
-	  # to unsupported forces relinking
-	  _LT_TAGVAR(hardcode_minus_L, $1)=yes
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-	  _LT_TAGVAR(hardcode_libdir_separator, $1)=
-	  fi
-	  ;;
-	esac
-	shared_flag='-shared'
-	if test "$aix_use_runtimelinking" = yes; then
-	  shared_flag="$shared_flag "'${wl}-G'
-	fi
-      else
-	# not using gcc
-	if test "$host_cpu" = ia64; then
-	# VisualAge C++, Version 5.5 for AIX 5L for IA-64, Beta 3 Release
-	# chokes on -Wl,-G. The following line is correct:
-	  shared_flag='-G'
-	else
-	  if test "$aix_use_runtimelinking" = yes; then
-	    shared_flag='${wl}-G'
-	  else
-	    shared_flag='${wl}-bM:SRE'
-	  fi
-	fi
-      fi
-
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-bexpall'
-      # It seems that -bexpall does not export symbols beginning with
-      # underscore (_), so it is better to generate a list of symbols to export.
-      _LT_TAGVAR(always_export_symbols, $1)=yes
-      if test "$aix_use_runtimelinking" = yes; then
-	# Warning - without using the other runtime loading flags (-brtl),
-	# -berok will link without error, but may produce a broken library.
-	_LT_TAGVAR(allow_undefined_flag, $1)='-berok'
-        # Determine the default libpath from the value encoded in an
-        # empty executable.
-        _LT_SYS_MODULE_PATH_AIX([$1])
-        _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-blibpath:$libdir:'"$aix_libpath"
-        _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags `if test "x${allow_undefined_flag}" != "x"; then func_echo_all "${wl}${allow_undefined_flag}"; else :; fi` '"\${wl}$exp_sym_flag:\$export_symbols $shared_flag"
-      else
-	if test "$host_cpu" = ia64; then
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-R $libdir:/usr/lib:/lib'
-	  _LT_TAGVAR(allow_undefined_flag, $1)="-z nodefs"
-	  _LT_TAGVAR(archive_expsym_cmds, $1)="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags ${wl}${allow_undefined_flag} '"\${wl}$exp_sym_flag:\$export_symbols"
-	else
-	 # Determine the default libpath from the value encoded in an
-	 # empty executable.
-	 _LT_SYS_MODULE_PATH_AIX([$1])
-	 _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-blibpath:$libdir:'"$aix_libpath"
-	  # Warning - without using the other run time loading flags,
-	  # -berok will link without error, but may produce a broken library.
-	  _LT_TAGVAR(no_undefined_flag, $1)=' ${wl}-bernotok'
-	  _LT_TAGVAR(allow_undefined_flag, $1)=' ${wl}-berok'
-	  if test "$with_gnu_ld" = yes; then
-	    # We only use this code for GNU lds that support --whole-archive.
-	    _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive$convenience ${wl}--no-whole-archive'
-	  else
-	    # Exported symbols can be pulled into shared objects from archives
-	    _LT_TAGVAR(whole_archive_flag_spec, $1)='$convenience'
-	  fi
-	  _LT_TAGVAR(archive_cmds_need_lc, $1)=yes
-	  # This is similar to how AIX traditionally builds its shared libraries.
-	  _LT_TAGVAR(archive_expsym_cmds, $1)="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs ${wl}-bnoentry $compiler_flags ${wl}-bE:$export_symbols${allow_undefined_flag}~$AR $AR_FLAGS $output_objdir/$libname$release.a $output_objdir/$soname'
-	fi
-      fi
-      ;;
-
-    amigaos*)
-      case $host_cpu in
-      powerpc)
-            # see comment about AmigaOS4 .so support
-            _LT_TAGVAR(archive_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-            _LT_TAGVAR(archive_expsym_cmds, $1)=''
-        ;;
-      m68k)
-            _LT_TAGVAR(archive_cmds, $1)='$RM $output_objdir/a2ixlibrary.data~$ECHO "#define NAME $libname" > $output_objdir/a2ixlibrary.data~$ECHO "#define LIBRARY_ID 1" >> $output_objdir/a2ixlibrary.data~$ECHO "#define VERSION $major" >> $output_objdir/a2ixlibrary.data~$ECHO "#define REVISION $revision" >> $output_objdir/a2ixlibrary.data~$AR $AR_FLAGS $lib $libobjs~$RANLIB $lib~(cd $output_objdir && a2ixlibrary -32)'
-            _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-            _LT_TAGVAR(hardcode_minus_L, $1)=yes
-        ;;
-      esac
-      ;;
-
-    bsdi[[45]]*)
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)=-rdynamic
-      ;;
-
-    cygwin* | mingw* | pw32* | cegcc*)
-      # When not using gcc, we currently assume that we are using
-      # Microsoft Visual C++.
-      # hardcode_libdir_flag_spec is actually meaningless, as there is
-      # no search path for DLLs.
-      case $cc_basename in
-      cl*)
-	# Native MSVC
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)=' '
-	_LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-	_LT_TAGVAR(always_export_symbols, $1)=yes
-	_LT_TAGVAR(file_list_spec, $1)='@'
-	# Tell ltmain to make .lib files, not .a files.
-	libext=lib
-	# Tell ltmain to make .dll files, not .so files.
-	shrext_cmds=".dll"
-	# FIXME: Setting linknames here is a bad hack.
-	_LT_TAGVAR(archive_cmds, $1)='$CC -o $output_objdir/$soname $libobjs $compiler_flags $deplibs -Wl,-dll~linknames='
-	_LT_TAGVAR(archive_expsym_cmds, $1)='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	    sed -n -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' -e '1\\\!p' < $export_symbols > $output_objdir/$soname.exp;
-	  else
-	    sed -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' < $export_symbols > $output_objdir/$soname.exp;
-	  fi~
-	  $CC -o $tool_output_objdir$soname $libobjs $compiler_flags $deplibs "@$tool_output_objdir$soname.exp" -Wl,-DLL,-IMPLIB:"$tool_output_objdir$libname.dll.lib"~
-	  linknames='
-	# The linker will not automatically build a static lib if we build a DLL.
-	# _LT_TAGVAR(old_archive_from_new_cmds, $1)='true'
-	_LT_TAGVAR(enable_shared_with_static_runtimes, $1)=yes
-	_LT_TAGVAR(exclude_expsyms, $1)='_NULL_IMPORT_DESCRIPTOR|_IMPORT_DESCRIPTOR_.*'
-	_LT_TAGVAR(export_symbols_cmds, $1)='$NM $libobjs $convenience | $global_symbol_pipe | $SED -e '\''/^[[BCDGRS]][[ ]]/s/.*[[ ]]\([[^ ]]*\)/\1,DATA/'\'' | $SED -e '\''/^[[AITW]][[ ]]/s/.*[[ ]]//'\'' | sort | uniq > $export_symbols'
-	# Don't use ranlib
-	_LT_TAGVAR(old_postinstall_cmds, $1)='chmod 644 $oldlib'
-	_LT_TAGVAR(postlink_cmds, $1)='lt_outputfile="@OUTPUT@"~
-	  lt_tool_outputfile="@TOOL_OUTPUT@"~
-	  case $lt_outputfile in
-	    *.exe|*.EXE) ;;
-	    *)
-	      lt_outputfile="$lt_outputfile.exe"
-	      lt_tool_outputfile="$lt_tool_outputfile.exe"
-	      ;;
-	  esac~
-	  if test "$MANIFEST_TOOL" != ":" && test -f "$lt_outputfile.manifest"; then
-	    $MANIFEST_TOOL -manifest "$lt_tool_outputfile.manifest" -outputresource:"$lt_tool_outputfile" || exit 1;
-	    $RM "$lt_outputfile.manifest";
-	  fi'
-	;;
-      *)
-	# Assume MSVC wrapper
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)=' '
-	_LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-	# Tell ltmain to make .lib files, not .a files.
-	libext=lib
-	# Tell ltmain to make .dll files, not .so files.
-	shrext_cmds=".dll"
-	# FIXME: Setting linknames here is a bad hack.
-	_LT_TAGVAR(archive_cmds, $1)='$CC -o $lib $libobjs $compiler_flags `func_echo_all "$deplibs" | $SED '\''s/ -lc$//'\''` -link -dll~linknames='
-	# The linker will automatically build a .lib file if we build a DLL.
-	_LT_TAGVAR(old_archive_from_new_cmds, $1)='true'
-	# FIXME: Should let the user specify the lib program.
-	_LT_TAGVAR(old_archive_cmds, $1)='lib -OUT:$oldlib$oldobjs$old_deplibs'
-	_LT_TAGVAR(enable_shared_with_static_runtimes, $1)=yes
-	;;
-      esac
-      ;;
-
-    darwin* | rhapsody*)
-      _LT_DARWIN_LINKER_FEATURES($1)
-      ;;
-
-    dgux*)
-      _LT_TAGVAR(archive_cmds, $1)='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    # FreeBSD 2.2.[012] allows us to include c++rt0.o to get C++ constructor
-    # support.  Future versions do this automatically, but an explicit c++rt0.o
-    # does not break anything, and helps significantly (at the cost of a little
-    # extra space).
-    freebsd2.2*)
-      _LT_TAGVAR(archive_cmds, $1)='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags /usr/lib/c++rt0.o'
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    # Unfortunately, older versions of FreeBSD 2 do not have this feature.
-    freebsd2.*)
-      _LT_TAGVAR(archive_cmds, $1)='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags'
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_minus_L, $1)=yes
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    # FreeBSD 3 and greater uses gcc -shared to do shared libraries.
-    freebsd* | dragonfly*)
-      _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags'
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    hpux9*)
-      if test "$GCC" = yes; then
-	_LT_TAGVAR(archive_cmds, $1)='$RM $output_objdir/$soname~$CC -shared $pic_flag ${wl}+b ${wl}$install_libdir -o $output_objdir/$soname $libobjs $deplibs $compiler_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$RM $output_objdir/$soname~$LD -b +b $install_libdir -o $output_objdir/$soname $libobjs $deplibs $linker_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-      fi
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}+b ${wl}$libdir'
-      _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-
-      # hardcode_minus_L: Not really in the search PATH,
-      # but as the default location of the library.
-      _LT_TAGVAR(hardcode_minus_L, $1)=yes
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-      ;;
-
-    hpux10*)
-      if test "$GCC" = yes && test "$with_gnu_ld" = no; then
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$LD -b +h $soname +b $install_libdir -o $lib $libobjs $deplibs $linker_flags'
-      fi
-      if test "$with_gnu_ld" = no; then
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}+b ${wl}$libdir'
-	_LT_TAGVAR(hardcode_libdir_separator, $1)=:
-	_LT_TAGVAR(hardcode_direct, $1)=yes
-	_LT_TAGVAR(hardcode_direct_absolute, $1)=yes
-	_LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-	# hardcode_minus_L: Not really in the search PATH,
-	# but as the default location of the library.
-	_LT_TAGVAR(hardcode_minus_L, $1)=yes
-      fi
-      ;;
-
-    hpux11*)
-      if test "$GCC" = yes && test "$with_gnu_ld" = no; then
-	case $host_cpu in
-	hppa*64*)
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -shared ${wl}+h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	ia64*)
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	*)
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	esac
-      else
-	case $host_cpu in
-	hppa*64*)
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -b ${wl}+h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	ia64*)
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -b ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	*)
-	m4_if($1, [], [
-	  # Older versions of the 11.00 compiler do not understand -b yet
-	  # (HP92453-01 A.11.01.20 doesn't, HP92453-01 B.11.X.35175-35176.GP does)
-	  _LT_LINKER_OPTION([if $CC understands -b],
-	    _LT_TAGVAR(lt_cv_prog_compiler__b, $1), [-b],
-	    [_LT_TAGVAR(archive_cmds, $1)='$CC -b ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $libobjs $deplibs $compiler_flags'],
-	    [_LT_TAGVAR(archive_cmds, $1)='$LD -b +h $soname +b $install_libdir -o $lib $libobjs $deplibs $linker_flags'])],
-	  [_LT_TAGVAR(archive_cmds, $1)='$CC -b ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $libobjs $deplibs $compiler_flags'])
-	  ;;
-	esac
-      fi
-      if test "$with_gnu_ld" = no; then
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}+b ${wl}$libdir'
-	_LT_TAGVAR(hardcode_libdir_separator, $1)=:
-
-	case $host_cpu in
-	hppa*64*|ia64*)
-	  _LT_TAGVAR(hardcode_direct, $1)=no
-	  _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	  ;;
-	*)
-	  _LT_TAGVAR(hardcode_direct, $1)=yes
-	  _LT_TAGVAR(hardcode_direct_absolute, $1)=yes
-	  _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-
-	  # hardcode_minus_L: Not really in the search PATH,
-	  # but as the default location of the library.
-	  _LT_TAGVAR(hardcode_minus_L, $1)=yes
-	  ;;
-	esac
-      fi
-      ;;
-
-    irix5* | irix6* | nonstopux*)
-      if test "$GCC" = yes; then
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-	# Try to use the -exported_symbol ld option, if it does not
-	# work, assume that -exports_file does not work either and
-	# implicitly export all symbols.
-	# This should be the same for all languages, so no per-tag cache variable.
-	AC_CACHE_CHECK([whether the $host_os linker accepts -exported_symbol],
-	  [lt_cv_irix_exported_symbol],
-	  [save_LDFLAGS="$LDFLAGS"
-	   LDFLAGS="$LDFLAGS -shared ${wl}-exported_symbol ${wl}foo ${wl}-update_registry ${wl}/dev/null"
-	   AC_LINK_IFELSE(
-	     [AC_LANG_SOURCE(
-	        [AC_LANG_CASE([C], [[int foo (void) { return 0; }]],
-			      [C++], [[int foo (void) { return 0; }]],
-			      [Fortran 77], [[
-      subroutine foo
-      end]],
-			      [Fortran], [[
-      subroutine foo
-      end]])])],
-	      [lt_cv_irix_exported_symbol=yes],
-	      [lt_cv_irix_exported_symbol=no])
-           LDFLAGS="$save_LDFLAGS"])
-	if test "$lt_cv_irix_exported_symbol" = yes; then
-          _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations ${wl}-exports_file ${wl}$export_symbols -o $lib'
-	fi
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -exports_file $export_symbols -o $lib'
-      fi
-      _LT_TAGVAR(archive_cmds_need_lc, $1)='no'
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-      _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-      _LT_TAGVAR(inherit_rpath, $1)=yes
-      _LT_TAGVAR(link_all_deplibs, $1)=yes
-      ;;
-
-    netbsd*)
-      if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-	_LT_TAGVAR(archive_cmds, $1)='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags'  # a.out
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$LD -shared -o $lib $libobjs $deplibs $linker_flags'      # ELF
-      fi
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    newsos6)
-      _LT_TAGVAR(archive_cmds, $1)='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-      _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    *nto* | *qnx*)
-      ;;
-
-    openbsd*)
-      if test -f /usr/libexec/ld.so; then
-	_LT_TAGVAR(hardcode_direct, $1)=yes
-	_LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	_LT_TAGVAR(hardcode_direct_absolute, $1)=yes
-	if test -z "`echo __ELF__ | $CC -E - | $GREP __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags'
-	  _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags ${wl}-retain-symbols-file,$export_symbols'
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-	  _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-	else
-	  case $host_os in
-	   openbsd[[01]].* | openbsd2.[[0-7]] | openbsd2.[[0-7]].*)
-	     _LT_TAGVAR(archive_cmds, $1)='$LD -Bshareable -o $lib $libobjs $deplibs $linker_flags'
-	     _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-	     ;;
-	   *)
-	     _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag -o $lib $libobjs $deplibs $compiler_flags'
-	     _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-	     ;;
-	  esac
-	fi
-      else
-	_LT_TAGVAR(ld_shlibs, $1)=no
-      fi
-      ;;
-
-    os2*)
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-      _LT_TAGVAR(hardcode_minus_L, $1)=yes
-      _LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-      _LT_TAGVAR(archive_cmds, $1)='$ECHO "LIBRARY $libname INITINSTANCE" > $output_objdir/$libname.def~$ECHO "DESCRIPTION \"$libname\"" >> $output_objdir/$libname.def~echo DATA >> $output_objdir/$libname.def~echo " SINGLE NONSHARED" >> $output_objdir/$libname.def~echo EXPORTS >> $output_objdir/$libname.def~emxexp $libobjs >> $output_objdir/$libname.def~$CC -Zdll -Zcrtdll -o $lib $libobjs $deplibs $compiler_flags $output_objdir/$libname.def'
-      _LT_TAGVAR(old_archive_from_new_cmds, $1)='emximp -o $output_objdir/$libname.a $output_objdir/$libname.def'
-      ;;
-
-    osf3*)
-      if test "$GCC" = yes; then
-	_LT_TAGVAR(allow_undefined_flag, $1)=' ${wl}-expect_unresolved ${wl}\*'
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared${allow_undefined_flag} $libobjs $deplibs $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-      else
-	_LT_TAGVAR(allow_undefined_flag, $1)=' -expect_unresolved \*'
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared${allow_undefined_flag} $libobjs $deplibs $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-      fi
-      _LT_TAGVAR(archive_cmds_need_lc, $1)='no'
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-      _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-      ;;
-
-    osf4* | osf5*)	# as osf3* with the addition of -msym flag
-      if test "$GCC" = yes; then
-	_LT_TAGVAR(allow_undefined_flag, $1)=' ${wl}-expect_unresolved ${wl}\*'
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared${allow_undefined_flag} $pic_flag $libobjs $deplibs $compiler_flags ${wl}-msym ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-      else
-	_LT_TAGVAR(allow_undefined_flag, $1)=' -expect_unresolved \*'
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared${allow_undefined_flag} $libobjs $deplibs $compiler_flags -msym -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='for i in `cat $export_symbols`; do printf "%s %s\\n" -exported_symbol "\$i" >> $lib.exp; done; printf "%s\\n" "-hidden">> $lib.exp~
-	$CC -shared${allow_undefined_flag} ${wl}-input ${wl}$lib.exp $compiler_flags $libobjs $deplibs -soname $soname `test -n "$verstring" && $ECHO "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib~$RM $lib.exp'
-
-	# Both c and cxx compiler support -rpath directly
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-rpath $libdir'
-      fi
-      _LT_TAGVAR(archive_cmds_need_lc, $1)='no'
-      _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-      ;;
-
-    solaris*)
-      _LT_TAGVAR(no_undefined_flag, $1)=' -z defs'
-      if test "$GCC" = yes; then
-	wlarc='${wl}'
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag ${wl}-z ${wl}text ${wl}-h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	  $CC -shared $pic_flag ${wl}-z ${wl}text ${wl}-M ${wl}$lib.exp ${wl}-h ${wl}$soname -o $lib $libobjs $deplibs $compiler_flags~$RM $lib.exp'
-      else
-	case `$CC -V 2>&1` in
-	*"Compilers 5.0"*)
-	  wlarc=''
-	  _LT_TAGVAR(archive_cmds, $1)='$LD -G${allow_undefined_flag} -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	  _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	  $LD -G${allow_undefined_flag} -M $lib.exp -h $soname -o $lib $libobjs $deplibs $linker_flags~$RM $lib.exp'
-	  ;;
-	*)
-	  wlarc='${wl}'
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -G${allow_undefined_flag} -h $soname -o $lib $libobjs $deplibs $compiler_flags'
-	  _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	  $CC -G${allow_undefined_flag} -M $lib.exp -h $soname -o $lib $libobjs $deplibs $compiler_flags~$RM $lib.exp'
-	  ;;
-	esac
-      fi
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      case $host_os in
-      solaris2.[[0-5]] | solaris2.[[0-5]].*) ;;
-      *)
-	# The compiler driver will combine and reorder linker options,
-	# but understands `-z linker_flag'.  GCC discards it without `$wl',
-	# but is careful enough not to reorder.
-	# Supported since Solaris 2.6 (maybe 2.5.1?)
-	if test "$GCC" = yes; then
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}-z ${wl}allextract$convenience ${wl}-z ${wl}defaultextract'
-	else
-	  _LT_TAGVAR(whole_archive_flag_spec, $1)='-z allextract$convenience -z defaultextract'
-	fi
-	;;
-      esac
-      _LT_TAGVAR(link_all_deplibs, $1)=yes
-      ;;
-
-    sunos4*)
-      if test "x$host_vendor" = xsequent; then
-	# Use $CC to link under sequent, because it throws in some extra .o
-	# files that make .init and .fini sections work.
-	_LT_TAGVAR(archive_cmds, $1)='$CC -G ${wl}-h $soname -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$LD -assert pure-text -Bstatic -o $lib $libobjs $deplibs $linker_flags'
-      fi
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-      _LT_TAGVAR(hardcode_direct, $1)=yes
-      _LT_TAGVAR(hardcode_minus_L, $1)=yes
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    sysv4)
-      case $host_vendor in
-	sni)
-	  _LT_TAGVAR(archive_cmds, $1)='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	  _LT_TAGVAR(hardcode_direct, $1)=yes # is this really true???
-	;;
-	siemens)
-	  ## LD is ld it makes a PLAMLIB
-	  ## CC just makes a GrossModule.
-	  _LT_TAGVAR(archive_cmds, $1)='$LD -G -o $lib $libobjs $deplibs $linker_flags'
-	  _LT_TAGVAR(reload_cmds, $1)='$CC -r -o $output$reload_objs'
-	  _LT_TAGVAR(hardcode_direct, $1)=no
-        ;;
-	motorola)
-	  _LT_TAGVAR(archive_cmds, $1)='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	  _LT_TAGVAR(hardcode_direct, $1)=no #Motorola manual says yes, but my tests say they lie
-	;;
-      esac
-      runpath_var='LD_RUN_PATH'
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    sysv4.3*)
-      _LT_TAGVAR(archive_cmds, $1)='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)='-Bexport'
-      ;;
-
-    sysv4*MP*)
-      if test -d /usr/nec; then
-	_LT_TAGVAR(archive_cmds, $1)='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-	_LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	runpath_var=LD_RUN_PATH
-	hardcode_runpath_var=yes
-	_LT_TAGVAR(ld_shlibs, $1)=yes
-      fi
-      ;;
-
-    sysv4*uw2* | sysv5OpenUNIX* | sysv5UnixWare7.[[01]].[[10]]* | unixware7* | sco3.2v5.0.[[024]]*)
-      _LT_TAGVAR(no_undefined_flag, $1)='${wl}-z,text'
-      _LT_TAGVAR(archive_cmds_need_lc, $1)=no
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      runpath_var='LD_RUN_PATH'
-
-      if test "$GCC" = yes; then
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      fi
-      ;;
-
-    sysv5* | sco3.2v5* | sco5v6*)
-      # Note: We can NOT use -z defs as we might desire, because we do not
-      # link with -lc, and that would cause any symbols used from libc to
-      # always be unresolved, which means just about no library would
-      # ever link correctly.  If we're not using GNU ld we use -z text
-      # though, which does catch some bad symbols but isn't as heavy-handed
-      # as -z defs.
-      _LT_TAGVAR(no_undefined_flag, $1)='${wl}-z,text'
-      _LT_TAGVAR(allow_undefined_flag, $1)='${wl}-z,nodefs'
-      _LT_TAGVAR(archive_cmds_need_lc, $1)=no
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-R,$libdir'
-      _LT_TAGVAR(hardcode_libdir_separator, $1)=':'
-      _LT_TAGVAR(link_all_deplibs, $1)=yes
-      _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-Bexport'
-      runpath_var='LD_RUN_PATH'
-
-      if test "$GCC" = yes; then
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      else
-	_LT_TAGVAR(archive_cmds, $1)='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-      fi
-      ;;
-
-    uts4*)
-      _LT_TAGVAR(archive_cmds, $1)='$LD -G -h $soname -o $lib $libobjs $deplibs $linker_flags'
-      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      ;;
-
-    *)
-      _LT_TAGVAR(ld_shlibs, $1)=no
-      ;;
-    esac
-
-    if test x$host_vendor = xsni; then
-      case $host in
-      sysv4 | sysv4.2uw2* | sysv4.3* | sysv5*)
-	_LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-Blargedynsym'
-	;;
-      esac
-    fi
-  fi
-])
-AC_MSG_RESULT([$_LT_TAGVAR(ld_shlibs, $1)])
-test "$_LT_TAGVAR(ld_shlibs, $1)" = no && can_build_shared=no
-
-_LT_TAGVAR(with_gnu_ld, $1)=$with_gnu_ld
-
-_LT_DECL([], [libext], [0], [Old archive suffix (normally "a")])dnl
-_LT_DECL([], [shrext_cmds], [1], [Shared library suffix (normally ".so")])dnl
-_LT_DECL([], [extract_expsyms_cmds], [2],
-    [The commands to extract the exported symbol list from a shared archive])
-
-#
-# Do we need to explicitly link libc?
-#
-case "x$_LT_TAGVAR(archive_cmds_need_lc, $1)" in
-x|xyes)
-  # Assume -lc should be added
-  _LT_TAGVAR(archive_cmds_need_lc, $1)=yes
-
-  if test "$enable_shared" = yes && test "$GCC" = yes; then
-    case $_LT_TAGVAR(archive_cmds, $1) in
-    *'~'*)
-      # FIXME: we may have to deal with multi-command sequences.
-      ;;
-    '$CC '*)
-      # Test whether the compiler implicitly links with -lc since on some
-      # systems, -lgcc has to come before -lc. If gcc already passes -lc
-      # to ld, don't add -lc before -lgcc.
-      AC_CACHE_CHECK([whether -lc should be explicitly linked in],
-	[lt_cv_]_LT_TAGVAR(archive_cmds_need_lc, $1),
-	[$RM conftest*
-	echo "$lt_simple_compile_test_code" > conftest.$ac_ext
-
-	if AC_TRY_EVAL(ac_compile) 2>conftest.err; then
-	  soname=conftest
-	  lib=conftest
-	  libobjs=conftest.$ac_objext
-	  deplibs=
-	  wl=$_LT_TAGVAR(lt_prog_compiler_wl, $1)
-	  pic_flag=$_LT_TAGVAR(lt_prog_compiler_pic, $1)
-	  compiler_flags=-v
-	  linker_flags=-v
-	  verstring=
-	  output_objdir=.
-	  libname=conftest
-	  lt_save_allow_undefined_flag=$_LT_TAGVAR(allow_undefined_flag, $1)
-	  _LT_TAGVAR(allow_undefined_flag, $1)=
-	  if AC_TRY_EVAL(_LT_TAGVAR(archive_cmds, $1) 2\>\&1 \| $GREP \" -lc \" \>/dev/null 2\>\&1)
-	  then
-	    lt_cv_[]_LT_TAGVAR(archive_cmds_need_lc, $1)=no
-	  else
-	    lt_cv_[]_LT_TAGVAR(archive_cmds_need_lc, $1)=yes
-	  fi
-	  _LT_TAGVAR(allow_undefined_flag, $1)=$lt_save_allow_undefined_flag
-	else
-	  cat conftest.err 1>&5
-	fi
-	$RM conftest*
-	])
-      _LT_TAGVAR(archive_cmds_need_lc, $1)=$lt_cv_[]_LT_TAGVAR(archive_cmds_need_lc, $1)
-      ;;
-    esac
-  fi
-  ;;
-esac
-
-_LT_TAGDECL([build_libtool_need_lc], [archive_cmds_need_lc], [0],
-    [Whether or not to add -lc for building shared libraries])
-_LT_TAGDECL([allow_libtool_libs_with_static_runtimes],
-    [enable_shared_with_static_runtimes], [0],
-    [Whether or not to disallow shared libs when runtime libs are static])
-_LT_TAGDECL([], [export_dynamic_flag_spec], [1],
-    [Compiler flag to allow reflexive dlopens])
-_LT_TAGDECL([], [whole_archive_flag_spec], [1],
-    [Compiler flag to generate shared objects directly from archives])
-_LT_TAGDECL([], [compiler_needs_object], [1],
-    [Whether the compiler copes with passing no objects directly])
-_LT_TAGDECL([], [old_archive_from_new_cmds], [2],
-    [Create an old-style archive from a shared archive])
-_LT_TAGDECL([], [old_archive_from_expsyms_cmds], [2],
-    [Create a temporary old-style archive to link instead of a shared archive])
-_LT_TAGDECL([], [archive_cmds], [2], [Commands used to build a shared archive])
-_LT_TAGDECL([], [archive_expsym_cmds], [2])
-_LT_TAGDECL([], [module_cmds], [2],
-    [Commands used to build a loadable module if different from building
-    a shared archive.])
-_LT_TAGDECL([], [module_expsym_cmds], [2])
-_LT_TAGDECL([], [with_gnu_ld], [1],
-    [Whether we are building with GNU ld or not])
-_LT_TAGDECL([], [allow_undefined_flag], [1],
-    [Flag that allows shared libraries with undefined symbols to be built])
-_LT_TAGDECL([], [no_undefined_flag], [1],
-    [Flag that enforces no undefined symbols])
-_LT_TAGDECL([], [hardcode_libdir_flag_spec], [1],
-    [Flag to hardcode $libdir into a binary during linking.
-    This must work even if $libdir does not exist])
-_LT_TAGDECL([], [hardcode_libdir_separator], [1],
-    [Whether we need a single "-rpath" flag with a separated argument])
-_LT_TAGDECL([], [hardcode_direct], [0],
-    [Set to "yes" if using DIR/libNAME${shared_ext} during linking hardcodes
-    DIR into the resulting binary])
-_LT_TAGDECL([], [hardcode_direct_absolute], [0],
-    [Set to "yes" if using DIR/libNAME${shared_ext} during linking hardcodes
-    DIR into the resulting binary and the resulting library dependency is
-    "absolute", i.e impossible to change by setting ${shlibpath_var} if the
-    library is relocated])
-_LT_TAGDECL([], [hardcode_minus_L], [0],
-    [Set to "yes" if using the -LDIR flag during linking hardcodes DIR
-    into the resulting binary])
-_LT_TAGDECL([], [hardcode_shlibpath_var], [0],
-    [Set to "yes" if using SHLIBPATH_VAR=DIR during linking hardcodes DIR
-    into the resulting binary])
-_LT_TAGDECL([], [hardcode_automatic], [0],
-    [Set to "yes" if building a shared library automatically hardcodes DIR
-    into the library and all subsequent libraries and executables linked
-    against it])
-_LT_TAGDECL([], [inherit_rpath], [0],
-    [Set to yes if linker adds runtime paths of dependent libraries
-    to runtime path list])
-_LT_TAGDECL([], [link_all_deplibs], [0],
-    [Whether libtool must link a program against all its dependency libraries])
-_LT_TAGDECL([], [always_export_symbols], [0],
-    [Set to "yes" if exported symbols are required])
-_LT_TAGDECL([], [export_symbols_cmds], [2],
-    [The commands to list exported symbols])
-_LT_TAGDECL([], [exclude_expsyms], [1],
-    [Symbols that should not be listed in the preloaded symbols])
-_LT_TAGDECL([], [include_expsyms], [1],
-    [Symbols that must always be exported])
-_LT_TAGDECL([], [prelink_cmds], [2],
-    [Commands necessary for linking programs (against libraries) with templates])
-_LT_TAGDECL([], [postlink_cmds], [2],
-    [Commands necessary for finishing linking programs])
-_LT_TAGDECL([], [file_list_spec], [1],
-    [Specify filename containing input files])
-dnl FIXME: Not yet implemented
-dnl _LT_TAGDECL([], [thread_safe_flag_spec], [1],
-dnl    [Compiler flag to generate thread safe objects])
-])# _LT_LINKER_SHLIBS
-
-
-# _LT_LANG_C_CONFIG([TAG])
-# ------------------------
-# Ensure that the configuration variables for a C compiler are suitably
-# defined.  These variables are subsequently used by _LT_CONFIG to write
-# the compiler configuration to `libtool'.
-m4_defun([_LT_LANG_C_CONFIG],
-[m4_require([_LT_DECL_EGREP])dnl
-lt_save_CC="$CC"
-AC_LANG_PUSH(C)
-
-# Source file extension for C test sources.
-ac_ext=c
-
-# Object file extension for compiled C test sources.
-objext=o
-_LT_TAGVAR(objext, $1)=$objext
-
-# Code to be used in simple compile tests
-lt_simple_compile_test_code="int some_variable = 0;"
-
-# Code to be used in simple link tests
-lt_simple_link_test_code='int main(){return(0);}'
-
-_LT_TAG_COMPILER
-# Save the default compiler, since it gets overwritten when the other
-# tags are being tested, and _LT_TAGVAR(compiler, []) is a NOP.
-compiler_DEFAULT=$CC
-
-# save warnings/boilerplate of simple test code
-_LT_COMPILER_BOILERPLATE
-_LT_LINKER_BOILERPLATE
-
-## CAVEAT EMPTOR:
-## There is no encapsulation within the following macros, do not change
-## the running order or otherwise move them around unless you know exactly
-## what you are doing...
-if test -n "$compiler"; then
-  _LT_COMPILER_NO_RTTI($1)
-  _LT_COMPILER_PIC($1)
-  _LT_COMPILER_C_O($1)
-  _LT_COMPILER_FILE_LOCKS($1)
-  _LT_LINKER_SHLIBS($1)
-  _LT_SYS_DYNAMIC_LINKER($1)
-  _LT_LINKER_HARDCODE_LIBPATH($1)
-  LT_SYS_DLOPEN_SELF
-  _LT_CMD_STRIPLIB
-
-  # Report which library types will actually be built
-  AC_MSG_CHECKING([if libtool supports shared libraries])
-  AC_MSG_RESULT([$can_build_shared])
-
-  AC_MSG_CHECKING([whether to build shared libraries])
-  test "$can_build_shared" = "no" && enable_shared=no
-
-  # On AIX, shared libraries and static libraries use the same namespace, and
-  # are all built from PIC.
-  case $host_os in
-  aix3*)
-    test "$enable_shared" = yes && enable_static=no
-    if test -n "$RANLIB"; then
-      archive_cmds="$archive_cmds~\$RANLIB \$lib"
-      postinstall_cmds='$RANLIB $lib'
-    fi
-    ;;
-
-  aix[[4-9]]*)
-    if test "$host_cpu" != ia64 && test "$aix_use_runtimelinking" = no ; then
-      test "$enable_shared" = yes && enable_static=no
-    fi
-    ;;
-  esac
-  AC_MSG_RESULT([$enable_shared])
-
-  AC_MSG_CHECKING([whether to build static libraries])
-  # Make sure either enable_shared or enable_static is yes.
-  test "$enable_shared" = yes || enable_static=yes
-  AC_MSG_RESULT([$enable_static])
-
-  _LT_CONFIG($1)
-fi
-AC_LANG_POP
-CC="$lt_save_CC"
-])# _LT_LANG_C_CONFIG
-
-
-# _LT_LANG_CXX_CONFIG([TAG])
-# --------------------------
-# Ensure that the configuration variables for a C++ compiler are suitably
-# defined.  These variables are subsequently used by _LT_CONFIG to write
-# the compiler configuration to `libtool'.
-m4_defun([_LT_LANG_CXX_CONFIG],
-[m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-m4_require([_LT_DECL_EGREP])dnl
-m4_require([_LT_PATH_MANIFEST_TOOL])dnl
-if test -n "$CXX" && ( test "X$CXX" != "Xno" &&
-    ( (test "X$CXX" = "Xg++" && `g++ -v >/dev/null 2>&1` ) ||
-    (test "X$CXX" != "Xg++"))) ; then
-  AC_PROG_CXXCPP
-else
-  _lt_caught_CXX_error=yes
-fi
-
-AC_LANG_PUSH(C++)
-_LT_TAGVAR(archive_cmds_need_lc, $1)=no
-_LT_TAGVAR(allow_undefined_flag, $1)=
-_LT_TAGVAR(always_export_symbols, $1)=no
-_LT_TAGVAR(archive_expsym_cmds, $1)=
-_LT_TAGVAR(compiler_needs_object, $1)=no
-_LT_TAGVAR(export_dynamic_flag_spec, $1)=
-_LT_TAGVAR(hardcode_direct, $1)=no
-_LT_TAGVAR(hardcode_direct_absolute, $1)=no
-_LT_TAGVAR(hardcode_libdir_flag_spec, $1)=
-_LT_TAGVAR(hardcode_libdir_separator, $1)=
-_LT_TAGVAR(hardcode_minus_L, $1)=no
-_LT_TAGVAR(hardcode_shlibpath_var, $1)=unsupported
-_LT_TAGVAR(hardcode_automatic, $1)=no
-_LT_TAGVAR(inherit_rpath, $1)=no
-_LT_TAGVAR(module_cmds, $1)=
-_LT_TAGVAR(module_expsym_cmds, $1)=
-_LT_TAGVAR(link_all_deplibs, $1)=unknown
-_LT_TAGVAR(old_archive_cmds, $1)=$old_archive_cmds
-_LT_TAGVAR(reload_flag, $1)=$reload_flag
-_LT_TAGVAR(reload_cmds, $1)=$reload_cmds
-_LT_TAGVAR(no_undefined_flag, $1)=
-_LT_TAGVAR(whole_archive_flag_spec, $1)=
-_LT_TAGVAR(enable_shared_with_static_runtimes, $1)=no
-
-# Source file extension for C++ test sources.
-ac_ext=cpp
-
-# Object file extension for compiled C++ test sources.
-objext=o
-_LT_TAGVAR(objext, $1)=$objext
-
-# No sense in running all these tests if we already determined that
-# the CXX compiler isn't working.  Some variables (like enable_shared)
-# are currently assumed to apply to all compilers on this platform,
-# and will be corrupted by setting them based on a non-working compiler.
-if test "$_lt_caught_CXX_error" != yes; then
-  # Code to be used in simple compile tests
-  lt_simple_compile_test_code="int some_variable = 0;"
-
-  # Code to be used in simple link tests
-  lt_simple_link_test_code='int main(int, char *[[]]) { return(0); }'
-
-  # ltmain only uses $CC for tagged configurations so make sure $CC is set.
-  _LT_TAG_COMPILER
-
-  # save warnings/boilerplate of simple test code
-  _LT_COMPILER_BOILERPLATE
-  _LT_LINKER_BOILERPLATE
-
-  # Allow CC to be a program name with arguments.
-  lt_save_CC=$CC
-  lt_save_CFLAGS=$CFLAGS
-  lt_save_LD=$LD
-  lt_save_GCC=$GCC
-  GCC=$GXX
-  lt_save_with_gnu_ld=$with_gnu_ld
-  lt_save_path_LD=$lt_cv_path_LD
-  if test -n "${lt_cv_prog_gnu_ldcxx+set}"; then
-    lt_cv_prog_gnu_ld=$lt_cv_prog_gnu_ldcxx
-  else
-    $as_unset lt_cv_prog_gnu_ld
-  fi
-  if test -n "${lt_cv_path_LDCXX+set}"; then
-    lt_cv_path_LD=$lt_cv_path_LDCXX
-  else
-    $as_unset lt_cv_path_LD
-  fi
-  test -z "${LDCXX+set}" || LD=$LDCXX
-  CC=${CXX-"c++"}
-  CFLAGS=$CXXFLAGS
-  compiler=$CC
-  _LT_TAGVAR(compiler, $1)=$CC
-  _LT_CC_BASENAME([$compiler])
-
-  if test -n "$compiler"; then
-    # We don't want -fno-exception when compiling C++ code, so set the
-    # no_builtin_flag separately
-    if test "$GXX" = yes; then
-      _LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1)=' -fno-builtin'
-    else
-      _LT_TAGVAR(lt_prog_compiler_no_builtin_flag, $1)=
-    fi
-
-    if test "$GXX" = yes; then
-      # Set up default GNU C++ configuration
-
-      LT_PATH_LD
-
-      # Check if GNU C++ uses GNU ld as the underlying linker, since the
-      # archiving commands below assume that GNU ld is being used.
-      if test "$with_gnu_ld" = yes; then
-        _LT_TAGVAR(archive_cmds, $1)='$CC $pic_flag -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname -o $lib'
-        _LT_TAGVAR(archive_expsym_cmds, $1)='$CC $pic_flag -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-
-        _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-        _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-dynamic'
-
-        # If archive_cmds runs LD, not CC, wlarc should be empty
-        # XXX I think wlarc can be eliminated in ltcf-cxx, but I need to
-        #     investigate it a little bit more. (MM)
-        wlarc='${wl}'
-
-        # ancient GNU ld didn't support --whole-archive et. al.
-        if eval "`$CC -print-prog-name=ld` --help 2>&1" |
-	  $GREP 'no-whole-archive' > /dev/null; then
-          _LT_TAGVAR(whole_archive_flag_spec, $1)="$wlarc"'--whole-archive$convenience '"$wlarc"'--no-whole-archive'
-        else
-          _LT_TAGVAR(whole_archive_flag_spec, $1)=
-        fi
-      else
-        with_gnu_ld=no
-        wlarc=
-
-        # A generic and very simple default shared library creation
-        # command for GNU C++ for the case where it uses the native
-        # linker, instead of GNU ld.  If possible, this setting should
-        # overridden to take advantage of the native linker features on
-        # the platform it is being used on.
-        _LT_TAGVAR(archive_cmds, $1)='$CC -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $lib'
-      fi
-
-      # Commands to make compiler produce verbose output that lists
-      # what "hidden" libraries, object files and flags are used when
-      # linking a shared library.
-      output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-
-    else
-      GXX=no
-      with_gnu_ld=no
-      wlarc=
-    fi
-
-    # PORTME: fill in a description of your system's C++ link characteristics
-    AC_MSG_CHECKING([whether the $compiler linker ($LD) supports shared libraries])
-    _LT_TAGVAR(ld_shlibs, $1)=yes
-    case $host_os in
-      aix3*)
-        # FIXME: insert proper C++ library support
-        _LT_TAGVAR(ld_shlibs, $1)=no
-        ;;
-      aix[[4-9]]*)
-        if test "$host_cpu" = ia64; then
-          # On IA64, the linker does run time linking by default, so we don't
-          # have to do anything special.
-          aix_use_runtimelinking=no
-          exp_sym_flag='-Bexport'
-          no_entry_flag=""
-        else
-          aix_use_runtimelinking=no
-
-          # Test if we are trying to use run time linking or normal
-          # AIX style linking. If -brtl is somewhere in LDFLAGS, we
-          # need to do runtime linking.
-          case $host_os in aix4.[[23]]|aix4.[[23]].*|aix[[5-9]]*)
-	    for ld_flag in $LDFLAGS; do
-	      case $ld_flag in
-	      *-brtl*)
-	        aix_use_runtimelinking=yes
-	        break
-	        ;;
-	      esac
-	    done
-	    ;;
-          esac
-
-          exp_sym_flag='-bexport'
-          no_entry_flag='-bnoentry'
-        fi
-
-        # When large executables or shared objects are built, AIX ld can
-        # have problems creating the table of contents.  If linking a library
-        # or program results in "error TOC overflow" add -mminimal-toc to
-        # CXXFLAGS/CFLAGS for g++/gcc.  In the cases where that is not
-        # enough to fix the problem, add -Wl,-bbigtoc to LDFLAGS.
-
-        _LT_TAGVAR(archive_cmds, $1)=''
-        _LT_TAGVAR(hardcode_direct, $1)=yes
-        _LT_TAGVAR(hardcode_direct_absolute, $1)=yes
-        _LT_TAGVAR(hardcode_libdir_separator, $1)=':'
-        _LT_TAGVAR(link_all_deplibs, $1)=yes
-        _LT_TAGVAR(file_list_spec, $1)='${wl}-f,'
-
-        if test "$GXX" = yes; then
-          case $host_os in aix4.[[012]]|aix4.[[012]].*)
-          # We only want to do this on AIX 4.2 and lower, the check
-          # below for broken collect2 doesn't work under 4.3+
-	  collect2name=`${CC} -print-prog-name=collect2`
-	  if test -f "$collect2name" &&
-	     strings "$collect2name" | $GREP resolve_lib_name >/dev/null
-	  then
-	    # We have reworked collect2
-	    :
-	  else
-	    # We have old collect2
-	    _LT_TAGVAR(hardcode_direct, $1)=unsupported
-	    # It fails to find uninstalled libraries when the uninstalled
-	    # path is not listed in the libpath.  Setting hardcode_minus_L
-	    # to unsupported forces relinking
-	    _LT_TAGVAR(hardcode_minus_L, $1)=yes
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-	    _LT_TAGVAR(hardcode_libdir_separator, $1)=
-	  fi
-          esac
-          shared_flag='-shared'
-	  if test "$aix_use_runtimelinking" = yes; then
-	    shared_flag="$shared_flag "'${wl}-G'
-	  fi
-        else
-          # not using gcc
-          if test "$host_cpu" = ia64; then
-	  # VisualAge C++, Version 5.5 for AIX 5L for IA-64, Beta 3 Release
-	  # chokes on -Wl,-G. The following line is correct:
-	  shared_flag='-G'
-          else
-	    if test "$aix_use_runtimelinking" = yes; then
-	      shared_flag='${wl}-G'
-	    else
-	      shared_flag='${wl}-bM:SRE'
-	    fi
-          fi
-        fi
-
-        _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-bexpall'
-        # It seems that -bexpall does not export symbols beginning with
-        # underscore (_), so it is better to generate a list of symbols to
-	# export.
-        _LT_TAGVAR(always_export_symbols, $1)=yes
-        if test "$aix_use_runtimelinking" = yes; then
-          # Warning - without using the other runtime loading flags (-brtl),
-          # -berok will link without error, but may produce a broken library.
-          _LT_TAGVAR(allow_undefined_flag, $1)='-berok'
-          # Determine the default libpath from the value encoded in an empty
-          # executable.
-          _LT_SYS_MODULE_PATH_AIX([$1])
-          _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-blibpath:$libdir:'"$aix_libpath"
-
-          _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags `if test "x${allow_undefined_flag}" != "x"; then func_echo_all "${wl}${allow_undefined_flag}"; else :; fi` '"\${wl}$exp_sym_flag:\$export_symbols $shared_flag"
-        else
-          if test "$host_cpu" = ia64; then
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-R $libdir:/usr/lib:/lib'
-	    _LT_TAGVAR(allow_undefined_flag, $1)="-z nodefs"
-	    _LT_TAGVAR(archive_expsym_cmds, $1)="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs '"\${wl}$no_entry_flag"' $compiler_flags ${wl}${allow_undefined_flag} '"\${wl}$exp_sym_flag:\$export_symbols"
-          else
-	    # Determine the default libpath from the value encoded in an
-	    # empty executable.
-	    _LT_SYS_MODULE_PATH_AIX([$1])
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-blibpath:$libdir:'"$aix_libpath"
-	    # Warning - without using the other run time loading flags,
-	    # -berok will link without error, but may produce a broken library.
-	    _LT_TAGVAR(no_undefined_flag, $1)=' ${wl}-bernotok'
-	    _LT_TAGVAR(allow_undefined_flag, $1)=' ${wl}-berok'
-	    if test "$with_gnu_ld" = yes; then
-	      # We only use this code for GNU lds that support --whole-archive.
-	      _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive$convenience ${wl}--no-whole-archive'
-	    else
-	      # Exported symbols can be pulled into shared objects from archives
-	      _LT_TAGVAR(whole_archive_flag_spec, $1)='$convenience'
-	    fi
-	    _LT_TAGVAR(archive_cmds_need_lc, $1)=yes
-	    # This is similar to how AIX traditionally builds its shared
-	    # libraries.
-	    _LT_TAGVAR(archive_expsym_cmds, $1)="\$CC $shared_flag"' -o $output_objdir/$soname $libobjs $deplibs ${wl}-bnoentry $compiler_flags ${wl}-bE:$export_symbols${allow_undefined_flag}~$AR $AR_FLAGS $output_objdir/$libname$release.a $output_objdir/$soname'
-          fi
-        fi
-        ;;
-
-      beos*)
-	if $LD --help 2>&1 | $GREP ': supported targets:.* elf' > /dev/null; then
-	  _LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-	  # Joseph Beckenbach <jrb3@best.com> says some releases of gcc
-	  # support --undefined.  This deserves some investigation.  FIXME
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -nostart $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	else
-	  _LT_TAGVAR(ld_shlibs, $1)=no
-	fi
-	;;
-
-      chorus*)
-        case $cc_basename in
-          *)
-	  # FIXME: insert proper C++ library support
-	  _LT_TAGVAR(ld_shlibs, $1)=no
-	  ;;
-        esac
-        ;;
-
-      cygwin* | mingw* | pw32* | cegcc*)
-	case $GXX,$cc_basename in
-	,cl* | no,cl*)
-	  # Native MSVC
-	  # hardcode_libdir_flag_spec is actually meaningless, as there is
-	  # no search path for DLLs.
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)=' '
-	  _LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-	  _LT_TAGVAR(always_export_symbols, $1)=yes
-	  _LT_TAGVAR(file_list_spec, $1)='@'
-	  # Tell ltmain to make .lib files, not .a files.
-	  libext=lib
-	  # Tell ltmain to make .dll files, not .so files.
-	  shrext_cmds=".dll"
-	  # FIXME: Setting linknames here is a bad hack.
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -o $output_objdir/$soname $libobjs $compiler_flags $deplibs -Wl,-dll~linknames='
-	  _LT_TAGVAR(archive_expsym_cmds, $1)='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	      $SED -n -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' -e '1\\\!p' < $export_symbols > $output_objdir/$soname.exp;
-	    else
-	      $SED -e 's/\\\\\\\(.*\\\\\\\)/-link\\\ -EXPORT:\\\\\\\1/' < $export_symbols > $output_objdir/$soname.exp;
-	    fi~
-	    $CC -o $tool_output_objdir$soname $libobjs $compiler_flags $deplibs "@$tool_output_objdir$soname.exp" -Wl,-DLL,-IMPLIB:"$tool_output_objdir$libname.dll.lib"~
-	    linknames='
-	  # The linker will not automatically build a static lib if we build a DLL.
-	  # _LT_TAGVAR(old_archive_from_new_cmds, $1)='true'
-	  _LT_TAGVAR(enable_shared_with_static_runtimes, $1)=yes
-	  # Don't use ranlib
-	  _LT_TAGVAR(old_postinstall_cmds, $1)='chmod 644 $oldlib'
-	  _LT_TAGVAR(postlink_cmds, $1)='lt_outputfile="@OUTPUT@"~
-	    lt_tool_outputfile="@TOOL_OUTPUT@"~
-	    case $lt_outputfile in
-	      *.exe|*.EXE) ;;
-	      *)
-		lt_outputfile="$lt_outputfile.exe"
-		lt_tool_outputfile="$lt_tool_outputfile.exe"
-		;;
-	    esac~
-	    func_to_tool_file "$lt_outputfile"~
-	    if test "$MANIFEST_TOOL" != ":" && test -f "$lt_outputfile.manifest"; then
-	      $MANIFEST_TOOL -manifest "$lt_tool_outputfile.manifest" -outputresource:"$lt_tool_outputfile" || exit 1;
-	      $RM "$lt_outputfile.manifest";
-	    fi'
-	  ;;
-	*)
-	  # g++
-	  # _LT_TAGVAR(hardcode_libdir_flag_spec, $1) is actually meaningless,
-	  # as there is no search path for DLLs.
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-L$libdir'
-	  _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-all-symbols'
-	  _LT_TAGVAR(allow_undefined_flag, $1)=unsupported
-	  _LT_TAGVAR(always_export_symbols, $1)=no
-	  _LT_TAGVAR(enable_shared_with_static_runtimes, $1)=yes
-
-	  if $LD --help 2>&1 | $GREP 'auto-import' > /dev/null; then
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -shared -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-	    # If the export-symbols file already is a .def file (1st line
-	    # is EXPORTS), use it as is; otherwise, prepend...
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='if test "x`$SED 1q $export_symbols`" = xEXPORTS; then
-	      cp $export_symbols $output_objdir/$soname.def;
-	    else
-	      echo EXPORTS > $output_objdir/$soname.def;
-	      cat $export_symbols >> $output_objdir/$soname.def;
-	    fi~
-	    $CC -shared -nostdlib $output_objdir/$soname.def $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $output_objdir/$soname ${wl}--enable-auto-image-base -Xlinker --out-implib -Xlinker $lib'
-	  else
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	  fi
-	  ;;
-	esac
-	;;
-      darwin* | rhapsody*)
-        _LT_DARWIN_LINKER_FEATURES($1)
-	;;
-
-      dgux*)
-        case $cc_basename in
-          ec++*)
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-          ghcx*)
-	    # Green Hills C++ Compiler
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-          *)
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-        esac
-        ;;
-
-      freebsd2.*)
-        # C++ shared libraries reported to be fairly broken before
-	# switch to ELF
-        _LT_TAGVAR(ld_shlibs, $1)=no
-        ;;
-
-      freebsd-elf*)
-        _LT_TAGVAR(archive_cmds_need_lc, $1)=no
-        ;;
-
-      freebsd* | dragonfly*)
-        # FreeBSD 3 and later use GNU C++ and GNU ld with standard ELF
-        # conventions
-        _LT_TAGVAR(ld_shlibs, $1)=yes
-        ;;
-
-      gnu*)
-        ;;
-
-      haiku*)
-        _LT_TAGVAR(archive_cmds, $1)='$CC -shared $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-        _LT_TAGVAR(link_all_deplibs, $1)=yes
-        ;;
-
-      hpux9*)
-        _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}+b ${wl}$libdir'
-        _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-        _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-        _LT_TAGVAR(hardcode_direct, $1)=yes
-        _LT_TAGVAR(hardcode_minus_L, $1)=yes # Not in the search PATH,
-				             # but as the default
-				             # location of the library.
-
-        case $cc_basename in
-          CC*)
-            # FIXME: insert proper C++ library support
-            _LT_TAGVAR(ld_shlibs, $1)=no
-            ;;
-          aCC*)
-            _LT_TAGVAR(archive_cmds, $1)='$RM $output_objdir/$soname~$CC -b ${wl}+b ${wl}$install_libdir -o $output_objdir/$soname $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-            # Commands to make compiler produce verbose output that lists
-            # what "hidden" libraries, object files and flags are used when
-            # linking a shared library.
-            #
-            # There doesn't appear to be a way to prevent this compiler from
-            # explicitly linking system object files so we need to strip them
-            # from the output so that they don't get included in the library
-            # dependencies.
-            output_verbose_link_cmd='templist=`($CC -b $CFLAGS -v conftest.$objext 2>&1) | $EGREP "\-L"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-            ;;
-          *)
-            if test "$GXX" = yes; then
-              _LT_TAGVAR(archive_cmds, $1)='$RM $output_objdir/$soname~$CC -shared -nostdlib $pic_flag ${wl}+b ${wl}$install_libdir -o $output_objdir/$soname $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~test $output_objdir/$soname = $lib || mv $output_objdir/$soname $lib'
-            else
-              # FIXME: insert proper C++ library support
-              _LT_TAGVAR(ld_shlibs, $1)=no
-            fi
-            ;;
-        esac
-        ;;
-
-      hpux10*|hpux11*)
-        if test $with_gnu_ld = no; then
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}+b ${wl}$libdir'
-	  _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-
-          case $host_cpu in
-            hppa*64*|ia64*)
-              ;;
-            *)
-	      _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-              ;;
-          esac
-        fi
-        case $host_cpu in
-          hppa*64*|ia64*)
-            _LT_TAGVAR(hardcode_direct, $1)=no
-            _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-            ;;
-          *)
-            _LT_TAGVAR(hardcode_direct, $1)=yes
-            _LT_TAGVAR(hardcode_direct_absolute, $1)=yes
-            _LT_TAGVAR(hardcode_minus_L, $1)=yes # Not in the search PATH,
-					         # but as the default
-					         # location of the library.
-            ;;
-        esac
-
-        case $cc_basename in
-          CC*)
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-          aCC*)
-	    case $host_cpu in
-	      hppa*64*)
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -b ${wl}+h ${wl}$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	        ;;
-	      ia64*)
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -b ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	        ;;
-	      *)
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -b ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	        ;;
-	    esac
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`($CC -b $CFLAGS -v conftest.$objext 2>&1) | $GREP "\-L"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-	    ;;
-          *)
-	    if test "$GXX" = yes; then
-	      if test $with_gnu_ld = no; then
-	        case $host_cpu in
-	          hppa*64*)
-	            _LT_TAGVAR(archive_cmds, $1)='$CC -shared -nostdlib -fPIC ${wl}+h ${wl}$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	            ;;
-	          ia64*)
-	            _LT_TAGVAR(archive_cmds, $1)='$CC -shared -nostdlib $pic_flag ${wl}+h ${wl}$soname ${wl}+nodefaultrpath -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	            ;;
-	          *)
-	            _LT_TAGVAR(archive_cmds, $1)='$CC -shared -nostdlib $pic_flag ${wl}+h ${wl}$soname ${wl}+b ${wl}$install_libdir -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	            ;;
-	        esac
-	      fi
-	    else
-	      # FIXME: insert proper C++ library support
-	      _LT_TAGVAR(ld_shlibs, $1)=no
-	    fi
-	    ;;
-        esac
-        ;;
-
-      interix[[3-9]]*)
-	_LT_TAGVAR(hardcode_direct, $1)=no
-	_LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-	_LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-	# Hack: On Interix 3.x, we cannot compile PIC because of a broken gcc.
-	# Instead, shared libraries are loaded at an image base (0x10000000 by
-	# default) and relocated if they conflict, which is a slow very memory
-	# consuming and fragmenting process.  To avoid this, we pick a random,
-	# 256 KiB-aligned image base between 0x50000000 and 0x6FFC0000 at link
-	# time.  Moving up from 0x10000000 also allows more sbrk(2) space.
-	_LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-	_LT_TAGVAR(archive_expsym_cmds, $1)='sed "s,^,_," $export_symbols >$output_objdir/$soname.expsym~$CC -shared $pic_flag $libobjs $deplibs $compiler_flags ${wl}-h,$soname ${wl}--retain-symbols-file,$output_objdir/$soname.expsym ${wl}--image-base,`expr ${RANDOM-$$} % 4096 / 2 \* 262144 + 1342177280` -o $lib'
-	;;
-      irix5* | irix6*)
-        case $cc_basename in
-          CC*)
-	    # SGI C++
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -shared -all -multigot $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-
-	    # Archives containing C++ object files must be created using
-	    # "CC -ar", where "CC" is the IRIX C++ compiler.  This is
-	    # necessary to make sure instantiated templates are included
-	    # in the archive.
-	    _LT_TAGVAR(old_archive_cmds, $1)='$CC -ar -WR,-u -o $oldlib $oldobjs'
-	    ;;
-          *)
-	    if test "$GXX" = yes; then
-	      if test "$with_gnu_ld" = no; then
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-	      else
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag -nostdlib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` -o $lib'
-	      fi
-	    fi
-	    _LT_TAGVAR(link_all_deplibs, $1)=yes
-	    ;;
-        esac
-        _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-        _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-        _LT_TAGVAR(inherit_rpath, $1)=yes
-        ;;
-
-      linux* | k*bsd*-gnu | kopensolaris*-gnu)
-        case $cc_basename in
-          KCC*)
-	    # Kuck and Associates, Inc. (KAI) C++ Compiler
-
-	    # KCC will only create a shared library if the output file
-	    # ends with ".so" (or ".sl" for HP-UX), so rename the library
-	    # to its proper name (with version) after linking.
-	    _LT_TAGVAR(archive_cmds, $1)='tempext=`echo $shared_ext | $SED -e '\''s/\([[^()0-9A-Za-z{}]]\)/\\\\\1/g'\''`; templib=`echo $lib | $SED -e "s/\${tempext}\..*/.so/"`; $CC $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags --soname $soname -o \$templib; mv \$templib $lib'
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='tempext=`echo $shared_ext | $SED -e '\''s/\([[^()0-9A-Za-z{}]]\)/\\\\\1/g'\''`; templib=`echo $lib | $SED -e "s/\${tempext}\..*/.so/"`; $CC $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags --soname $soname -o \$templib ${wl}-retain-symbols-file,$export_symbols; mv \$templib $lib'
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`$CC $CFLAGS -v conftest.$objext -o libconftest$shared_ext 2>&1 | $GREP "ld"`; rm -f libconftest$shared_ext; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-	    _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-dynamic'
-
-	    # Archives containing C++ object files must be created using
-	    # "CC -Bstatic", where "CC" is the KAI C++ compiler.
-	    _LT_TAGVAR(old_archive_cmds, $1)='$CC -Bstatic -o $oldlib $oldobjs'
-	    ;;
-	  icpc* | ecpc* )
-	    # Intel C++
-	    with_gnu_ld=yes
-	    # version 8.0 and above of icpc choke on multiply defined symbols
-	    # if we add $predep_objects and $postdep_objects, however 7.1 and
-	    # earlier do not add the objects themselves.
-	    case `$CC -V 2>&1` in
-	      *"Version 7."*)
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname -o $lib'
-		_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-		;;
-	      *)  # Version 8.0 or newer
-	        tmp_idyn=
-	        case $host_cpu in
-		  ia64*) tmp_idyn=' -i_dynamic';;
-		esac
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -shared'"$tmp_idyn"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-		_LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared'"$tmp_idyn"' $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-retain-symbols-file $wl$export_symbols -o $lib'
-		;;
-	    esac
-	    _LT_TAGVAR(archive_cmds_need_lc, $1)=no
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-	    _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-dynamic'
-	    _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive$convenience ${wl}--no-whole-archive'
-	    ;;
-          pgCC* | pgcpp*)
-            # Portland Group C++ compiler
-	    case `$CC -V` in
-	    *pgCC\ [[1-5]].* | *pgcpp\ [[1-5]].*)
-	      _LT_TAGVAR(prelink_cmds, $1)='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $objs $libobjs $compile_deplibs~
-		compile_command="$compile_command `find $tpldir -name \*.o | sort | $NL2SP`"'
-	      _LT_TAGVAR(old_archive_cmds, $1)='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $oldobjs$old_deplibs~
-		$AR $AR_FLAGS $oldlib$oldobjs$old_deplibs `find $tpldir -name \*.o | sort | $NL2SP`~
-		$RANLIB $oldlib'
-	      _LT_TAGVAR(archive_cmds, $1)='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $predep_objects $libobjs $deplibs $convenience $postdep_objects~
-		$CC -shared $pic_flag $predep_objects $libobjs $deplibs `find $tpldir -name \*.o | sort | $NL2SP` $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname -o $lib'
-	      _LT_TAGVAR(archive_expsym_cmds, $1)='tpldir=Template.dir~
-		rm -rf $tpldir~
-		$CC --prelink_objects --instantiation_dir $tpldir $predep_objects $libobjs $deplibs $convenience $postdep_objects~
-		$CC -shared $pic_flag $predep_objects $libobjs $deplibs `find $tpldir -name \*.o | sort | $NL2SP` $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname ${wl}-retain-symbols-file ${wl}$export_symbols -o $lib'
-	      ;;
-	    *) # Version 6 and above use weak symbols
-	      _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname -o $lib'
-	      _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname ${wl}-retain-symbols-file ${wl}$export_symbols -o $lib'
-	      ;;
-	    esac
-
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}--rpath ${wl}$libdir'
-	    _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-dynamic'
-	    _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive`for conv in $convenience\"\"; do test  -n \"$conv\" && new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-            ;;
-	  cxx*)
-	    # Compaq C++
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $wl$soname  -o $lib ${wl}-retain-symbols-file $wl$export_symbols'
-
-	    runpath_var=LD_RUN_PATH
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-rpath $libdir'
-	    _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP "ld"`; templist=`func_echo_all "$templist" | $SED "s/\(^.*ld.*\)\( .*ld .*$\)/\1/"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "X$list" | $Xsed'
-	    ;;
-	  xl* | mpixl* | bgxl*)
-	    # IBM XL 8.0 on PPC, with GNU ld
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-	    _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}--export-dynamic'
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -qmkshrobj $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname -o $lib'
-	    if test "x$supports_anon_versioning" = xyes; then
-	      _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $output_objdir/$libname.ver~
-		cat $export_symbols | sed -e "s/\(.*\)/\1;/" >> $output_objdir/$libname.ver~
-		echo "local: *; };" >> $output_objdir/$libname.ver~
-		$CC -qmkshrobj $libobjs $deplibs $compiler_flags ${wl}-soname $wl$soname ${wl}-version-script ${wl}$output_objdir/$libname.ver -o $lib'
-	    fi
-	    ;;
-	  *)
-	    case `$CC -V 2>&1 | sed 5q` in
-	    *Sun\ C*)
-	      # Sun C++ 5.9
-	      _LT_TAGVAR(no_undefined_flag, $1)=' -zdefs'
-	      _LT_TAGVAR(archive_cmds, $1)='$CC -G${allow_undefined_flag} -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	      _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -G${allow_undefined_flag} -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-retain-symbols-file ${wl}$export_symbols'
-	      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-	      _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}--whole-archive`new_convenience=; for conv in $convenience\"\"; do test -z \"$conv\" || new_convenience=\"$new_convenience,$conv\"; done; func_echo_all \"$new_convenience\"` ${wl}--no-whole-archive'
-	      _LT_TAGVAR(compiler_needs_object, $1)=yes
-
-	      # Not sure whether something based on
-	      # $CC $CFLAGS -v conftest.$objext -o libconftest$shared_ext 2>&1
-	      # would be better.
-	      output_verbose_link_cmd='func_echo_all'
-
-	      # Archives containing C++ object files must be created using
-	      # "CC -xar", where "CC" is the Sun C++ compiler.  This is
-	      # necessary to make sure instantiated templates are included
-	      # in the archive.
-	      _LT_TAGVAR(old_archive_cmds, $1)='$CC -xar -o $oldlib $oldobjs'
-	      ;;
-	    esac
-	    ;;
-	esac
-	;;
-
-      lynxos*)
-        # FIXME: insert proper C++ library support
-	_LT_TAGVAR(ld_shlibs, $1)=no
-	;;
-
-      m88k*)
-        # FIXME: insert proper C++ library support
-        _LT_TAGVAR(ld_shlibs, $1)=no
-	;;
-
-      mvs*)
-        case $cc_basename in
-          cxx*)
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-	  *)
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-	esac
-	;;
-
-      netbsd*)
-        if echo __ELF__ | $CC -E - | $GREP __ELF__ >/dev/null; then
-	  _LT_TAGVAR(archive_cmds, $1)='$LD -Bshareable  -o $lib $predep_objects $libobjs $deplibs $postdep_objects $linker_flags'
-	  wlarc=
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-	  _LT_TAGVAR(hardcode_direct, $1)=yes
-	  _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	fi
-	# Workaround some broken pre-1.5 toolchains
-	output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP conftest.$objext | $SED -e "s:-lgcc -lc -lgcc::"'
-	;;
-
-      *nto* | *qnx*)
-        _LT_TAGVAR(ld_shlibs, $1)=yes
-	;;
-
-      openbsd2*)
-        # C++ shared libraries are fairly broken
-	_LT_TAGVAR(ld_shlibs, $1)=no
-	;;
-
-      openbsd*)
-	if test -f /usr/libexec/ld.so; then
-	  _LT_TAGVAR(hardcode_direct, $1)=yes
-	  _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	  _LT_TAGVAR(hardcode_direct_absolute, $1)=yes
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -o $lib'
-	  _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-	  if test -z "`echo __ELF__ | $CC -E - | grep __ELF__`" || test "$host_os-$host_cpu" = "openbsd2.8-powerpc"; then
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared $pic_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-retain-symbols-file,$export_symbols -o $lib'
-	    _LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-E'
-	    _LT_TAGVAR(whole_archive_flag_spec, $1)="$wlarc"'--whole-archive$convenience '"$wlarc"'--no-whole-archive'
-	  fi
-	  output_verbose_link_cmd=func_echo_all
-	else
-	  _LT_TAGVAR(ld_shlibs, $1)=no
-	fi
-	;;
-
-      osf3* | osf4* | osf5*)
-        case $cc_basename in
-          KCC*)
-	    # Kuck and Associates, Inc. (KAI) C++ Compiler
-
-	    # KCC will only create a shared library if the output file
-	    # ends with ".so" (or ".sl" for HP-UX), so rename the library
-	    # to its proper name (with version) after linking.
-	    _LT_TAGVAR(archive_cmds, $1)='tempext=`echo $shared_ext | $SED -e '\''s/\([[^()0-9A-Za-z{}]]\)/\\\\\1/g'\''`; templib=`echo "$lib" | $SED -e "s/\${tempext}\..*/.so/"`; $CC $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags --soname $soname -o \$templib; mv \$templib $lib'
-
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath,$libdir'
-	    _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-
-	    # Archives containing C++ object files must be created using
-	    # the KAI C++ compiler.
-	    case $host in
-	      osf3*) _LT_TAGVAR(old_archive_cmds, $1)='$CC -Bstatic -o $oldlib $oldobjs' ;;
-	      *) _LT_TAGVAR(old_archive_cmds, $1)='$CC -o $oldlib $oldobjs' ;;
-	    esac
-	    ;;
-          RCC*)
-	    # Rational C++ 2.4.1
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-          cxx*)
-	    case $host in
-	      osf3*)
-	        _LT_TAGVAR(allow_undefined_flag, $1)=' ${wl}-expect_unresolved ${wl}\*'
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -shared${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname $soname `test -n "$verstring" && func_echo_all "${wl}-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	        _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-		;;
-	      *)
-	        _LT_TAGVAR(allow_undefined_flag, $1)=' -expect_unresolved \*'
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -shared${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -msym -soname $soname `test -n "$verstring" && func_echo_all "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib'
-	        _LT_TAGVAR(archive_expsym_cmds, $1)='for i in `cat $export_symbols`; do printf "%s %s\\n" -exported_symbol "\$i" >> $lib.exp; done~
-	          echo "-hidden">> $lib.exp~
-	          $CC -shared$allow_undefined_flag $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags -msym -soname $soname ${wl}-input ${wl}$lib.exp  `test -n "$verstring" && $ECHO "-set_version $verstring"` -update_registry ${output_objdir}/so_locations -o $lib~
-	          $RM $lib.exp'
-	        _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-rpath $libdir'
-		;;
-	    esac
-
-	    _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-
-	    # Commands to make compiler produce verbose output that lists
-	    # what "hidden" libraries, object files and flags are used when
-	    # linking a shared library.
-	    #
-	    # There doesn't appear to be a way to prevent this compiler from
-	    # explicitly linking system object files so we need to strip them
-	    # from the output so that they don't get included in the library
-	    # dependencies.
-	    output_verbose_link_cmd='templist=`$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP "ld" | $GREP -v "ld:"`; templist=`func_echo_all "$templist" | $SED "s/\(^.*ld.*\)\( .*ld.*$\)/\1/"`; list=""; for z in $templist; do case $z in conftest.$objext) list="$list $z";; *.$objext);; *) list="$list $z";;esac; done; func_echo_all "$list"'
-	    ;;
-	  *)
-	    if test "$GXX" = yes && test "$with_gnu_ld" = no; then
-	      _LT_TAGVAR(allow_undefined_flag, $1)=' ${wl}-expect_unresolved ${wl}\*'
-	      case $host in
-	        osf3*)
-	          _LT_TAGVAR(archive_cmds, $1)='$CC -shared -nostdlib ${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-		  ;;
-	        *)
-	          _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag -nostdlib ${allow_undefined_flag} $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-msym ${wl}-soname ${wl}$soname `test -n "$verstring" && func_echo_all "${wl}-set_version ${wl}$verstring"` ${wl}-update_registry ${wl}${output_objdir}/so_locations -o $lib'
-		  ;;
-	      esac
-
-	      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-rpath ${wl}$libdir'
-	      _LT_TAGVAR(hardcode_libdir_separator, $1)=:
-
-	      # Commands to make compiler produce verbose output that lists
-	      # what "hidden" libraries, object files and flags are used when
-	      # linking a shared library.
-	      output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-
-	    else
-	      # FIXME: insert proper C++ library support
-	      _LT_TAGVAR(ld_shlibs, $1)=no
-	    fi
-	    ;;
-        esac
-        ;;
-
-      psos*)
-        # FIXME: insert proper C++ library support
-        _LT_TAGVAR(ld_shlibs, $1)=no
-        ;;
-
-      sunos4*)
-        case $cc_basename in
-          CC*)
-	    # Sun C++ 4.x
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-          lcc*)
-	    # Lucid
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-          *)
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-        esac
-        ;;
-
-      solaris*)
-        case $cc_basename in
-          CC* | sunCC*)
-	    # Sun C++ 4.2, 5.x and Centerline C++
-            _LT_TAGVAR(archive_cmds_need_lc,$1)=yes
-	    _LT_TAGVAR(no_undefined_flag, $1)=' -zdefs'
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -G${allow_undefined_flag}  -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags'
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-	      $CC -G${allow_undefined_flag} ${wl}-M ${wl}$lib.exp -h$soname -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~$RM $lib.exp'
-
-	    _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='-R$libdir'
-	    _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	    case $host_os in
-	      solaris2.[[0-5]] | solaris2.[[0-5]].*) ;;
-	      *)
-		# The compiler driver will combine and reorder linker options,
-		# but understands `-z linker_flag'.
-	        # Supported since Solaris 2.6 (maybe 2.5.1?)
-		_LT_TAGVAR(whole_archive_flag_spec, $1)='-z allextract$convenience -z defaultextract'
-	        ;;
-	    esac
-	    _LT_TAGVAR(link_all_deplibs, $1)=yes
-
-	    output_verbose_link_cmd='func_echo_all'
-
-	    # Archives containing C++ object files must be created using
-	    # "CC -xar", where "CC" is the Sun C++ compiler.  This is
-	    # necessary to make sure instantiated templates are included
-	    # in the archive.
-	    _LT_TAGVAR(old_archive_cmds, $1)='$CC -xar -o $oldlib $oldobjs'
-	    ;;
-          gcx*)
-	    # Green Hills C++ Compiler
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -shared $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-h $wl$soname -o $lib'
-
-	    # The C++ compiler must be used to create the archive.
-	    _LT_TAGVAR(old_archive_cmds, $1)='$CC $LDFLAGS -archive -o $oldlib $oldobjs'
-	    ;;
-          *)
-	    # GNU C++ compiler with Solaris linker
-	    if test "$GXX" = yes && test "$with_gnu_ld" = no; then
-	      _LT_TAGVAR(no_undefined_flag, $1)=' ${wl}-z ${wl}defs'
-	      if $CC --version | $GREP -v '^2\.7' > /dev/null; then
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -shared $pic_flag -nostdlib $LDFLAGS $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-h $wl$soname -o $lib'
-	        _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-		  $CC -shared $pic_flag -nostdlib ${wl}-M $wl$lib.exp -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~$RM $lib.exp'
-
-	        # Commands to make compiler produce verbose output that lists
-	        # what "hidden" libraries, object files and flags are used when
-	        # linking a shared library.
-	        output_verbose_link_cmd='$CC -shared $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-	      else
-	        # g++ 2.7 appears to require `-G' NOT `-shared' on this
-	        # platform.
-	        _LT_TAGVAR(archive_cmds, $1)='$CC -G -nostdlib $LDFLAGS $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags ${wl}-h $wl$soname -o $lib'
-	        _LT_TAGVAR(archive_expsym_cmds, $1)='echo "{ global:" > $lib.exp~cat $export_symbols | $SED -e "s/\(.*\)/\1;/" >> $lib.exp~echo "local: *; };" >> $lib.exp~
-		  $CC -G -nostdlib ${wl}-M $wl$lib.exp -o $lib $predep_objects $libobjs $deplibs $postdep_objects $compiler_flags~$RM $lib.exp'
-
-	        # Commands to make compiler produce verbose output that lists
-	        # what "hidden" libraries, object files and flags are used when
-	        # linking a shared library.
-	        output_verbose_link_cmd='$CC -G $CFLAGS -v conftest.$objext 2>&1 | $GREP -v "^Configured with:" | $GREP "\-L"'
-	      fi
-
-	      _LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-R $wl$libdir'
-	      case $host_os in
-		solaris2.[[0-5]] | solaris2.[[0-5]].*) ;;
-		*)
-		  _LT_TAGVAR(whole_archive_flag_spec, $1)='${wl}-z ${wl}allextract$convenience ${wl}-z ${wl}defaultextract'
-		  ;;
-	      esac
-	    fi
-	    ;;
-        esac
-        ;;
-
-    sysv4*uw2* | sysv5OpenUNIX* | sysv5UnixWare7.[[01]].[[10]]* | unixware7* | sco3.2v5.0.[[024]]*)
-      _LT_TAGVAR(no_undefined_flag, $1)='${wl}-z,text'
-      _LT_TAGVAR(archive_cmds_need_lc, $1)=no
-      _LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-      runpath_var='LD_RUN_PATH'
-
-      case $cc_basename in
-        CC*)
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-	*)
-	  _LT_TAGVAR(archive_cmds, $1)='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	  ;;
-      esac
-      ;;
-
-      sysv5* | sco3.2v5* | sco5v6*)
-	# Note: We can NOT use -z defs as we might desire, because we do not
-	# link with -lc, and that would cause any symbols used from libc to
-	# always be unresolved, which means just about no library would
-	# ever link correctly.  If we're not using GNU ld we use -z text
-	# though, which does catch some bad symbols but isn't as heavy-handed
-	# as -z defs.
-	_LT_TAGVAR(no_undefined_flag, $1)='${wl}-z,text'
-	_LT_TAGVAR(allow_undefined_flag, $1)='${wl}-z,nodefs'
-	_LT_TAGVAR(archive_cmds_need_lc, $1)=no
-	_LT_TAGVAR(hardcode_shlibpath_var, $1)=no
-	_LT_TAGVAR(hardcode_libdir_flag_spec, $1)='${wl}-R,$libdir'
-	_LT_TAGVAR(hardcode_libdir_separator, $1)=':'
-	_LT_TAGVAR(link_all_deplibs, $1)=yes
-	_LT_TAGVAR(export_dynamic_flag_spec, $1)='${wl}-Bexport'
-	runpath_var='LD_RUN_PATH'
-
-	case $cc_basename in
-          CC*)
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -G ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -G ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    _LT_TAGVAR(old_archive_cmds, $1)='$CC -Tprelink_objects $oldobjs~
-	      '"$_LT_TAGVAR(old_archive_cmds, $1)"
-	    _LT_TAGVAR(reload_cmds, $1)='$CC -Tprelink_objects $reload_objs~
-	      '"$_LT_TAGVAR(reload_cmds, $1)"
-	    ;;
-	  *)
-	    _LT_TAGVAR(archive_cmds, $1)='$CC -shared ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    _LT_TAGVAR(archive_expsym_cmds, $1)='$CC -shared ${wl}-Bexport:$export_symbols ${wl}-h,$soname -o $lib $libobjs $deplibs $compiler_flags'
-	    ;;
-	esac
-      ;;
-
-      tandem*)
-        case $cc_basename in
-          NCC*)
-	    # NonStop-UX NCC 3.20
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-          *)
-	    # FIXME: insert proper C++ library support
-	    _LT_TAGVAR(ld_shlibs, $1)=no
-	    ;;
-        esac
-        ;;
-
-      vxworks*)
-        # FIXME: insert proper C++ library support
-        _LT_TAGVAR(ld_shlibs, $1)=no
-        ;;
-
-      *)
-        # FIXME: insert proper C++ library support
-        _LT_TAGVAR(ld_shlibs, $1)=no
-        ;;
-    esac
-
-    AC_MSG_RESULT([$_LT_TAGVAR(ld_shlibs, $1)])
-    test "$_LT_TAGVAR(ld_shlibs, $1)" = no && can_build_shared=no
-
-    _LT_TAGVAR(GCC, $1)="$GXX"
-    _LT_TAGVAR(LD, $1)="$LD"
-
-    ## CAVEAT EMPTOR:
-    ## There is no encapsulation within the following macros, do not change
-    ## the running order or otherwise move them around unless you know exactly
-    ## what you are doing...
-    _LT_SYS_HIDDEN_LIBDEPS($1)
-    _LT_COMPILER_PIC($1)
-    _LT_COMPILER_C_O($1)
-    _LT_COMPILER_FILE_LOCKS($1)
-    _LT_LINKER_SHLIBS($1)
-    _LT_SYS_DYNAMIC_LINKER($1)
-    _LT_LINKER_HARDCODE_LIBPATH($1)
-
-    _LT_CONFIG($1)
-  fi # test -n "$compiler"
-
-  CC=$lt_save_CC
-  CFLAGS=$lt_save_CFLAGS
-  LDCXX=$LD
-  LD=$lt_save_LD
-  GCC=$lt_save_GCC
-  with_gnu_ld=$lt_save_with_gnu_ld
-  lt_cv_path_LDCXX=$lt_cv_path_LD
-  lt_cv_path_LD=$lt_save_path_LD
-  lt_cv_prog_gnu_ldcxx=$lt_cv_prog_gnu_ld
-  lt_cv_prog_gnu_ld=$lt_save_with_gnu_ld
-fi # test "$_lt_caught_CXX_error" != yes
-
-AC_LANG_POP
-])# _LT_LANG_CXX_CONFIG
-
-
-# _LT_FUNC_STRIPNAME_CNF
-# ----------------------
-# func_stripname_cnf prefix suffix name
-# strip PREFIX and SUFFIX off of NAME.
-# PREFIX and SUFFIX must not contain globbing or regex special
-# characters, hashes, percent signs, but SUFFIX may contain a leading
-# dot (in which case that matches only a dot).
-#
-# This function is identical to the (non-XSI) version of func_stripname,
-# except this one can be used by m4 code that may be executed by configure,
-# rather than the libtool script.
-m4_defun([_LT_FUNC_STRIPNAME_CNF],[dnl
-AC_REQUIRE([_LT_DECL_SED])
-AC_REQUIRE([_LT_PROG_ECHO_BACKSLASH])
-func_stripname_cnf ()
-{
-  case ${2} in
-  .*) func_stripname_result=`$ECHO "${3}" | $SED "s%^${1}%%; s%\\\\${2}\$%%"`;;
-  *)  func_stripname_result=`$ECHO "${3}" | $SED "s%^${1}%%; s%${2}\$%%"`;;
-  esac
-} # func_stripname_cnf
-])# _LT_FUNC_STRIPNAME_CNF
-
-# _LT_SYS_HIDDEN_LIBDEPS([TAGNAME])
-# ---------------------------------
-# Figure out "hidden" library dependencies from verbose
-# compiler output when linking a shared library.
-# Parse the compiler output and extract the necessary
-# objects, libraries and library flags.
-m4_defun([_LT_SYS_HIDDEN_LIBDEPS],
-[m4_require([_LT_FILEUTILS_DEFAULTS])dnl
-AC_REQUIRE([_LT_FUNC_STRIPNAME_CNF])dnl
-# Dependencies to place before and after the object being linked:
-_LT_TAGVAR(predep_objects, $1)=
-_LT_TAGVAR(postdep_objects, $1)=
-_LT_TAGVAR(predeps, $1)=
-_LT_TAGVAR(postdeps, $1)=
-_LT_TAGVAR(compiler_lib_search_path, $1)=
-
-dnl we can't use the lt_simple_compile_test_code here,
-dnl because it contains code intended for an executable,
-dnl not a library.  It's possible we should let each
-dnl tag define a new lt_????_link_test_code variable,
-dnl but it's only used here...
-m4_if([$1], [], [cat > conftest.$ac_ext <<_LT_EOF
-int a;
-void foo (void) { a = 0; }
-_LT_EOF
-], [$1], [CXX], [cat > conftest.$ac_ext <<_LT_EOF
-class Foo
-{
-public:
-  Foo (void) { a = 0; }
-private:
-  int a;
-};
-_LT_EOF
-], [$1], [F77], [cat > conftest.$ac_ext <<_LT_EOF
-      subroutine foo
-      implicit none
-      integer*4 a
-      a=0
-      return
-      end
-_LT_EOF
-], [$1], [FC], [cat > conftest.$ac_ext <<_LT_EOF
-      subroutine foo
-      implicit none
-      integer a
-      a=0
-      return
-      end
-_LT_EOF
-], [$1], [GCJ], [cat > conftest.$ac_ext <<_LT_EOF
-public class foo {
-  private int a;
-  public void bar (void) {
-    a = 0;
-  }
-};
-_LT_EOF
-], [$1], [GO], [cat > conftest.$ac_ext <<_LT_EOF
-package foo
-func foo() {
-}
-_LT_EOF
-])
-
-_lt_libdeps_save_CFLAGS=$CFLAGS
-case "$CC $CFLAGS " in #(
-*\ -flto*\ *) CFLAGS="$CFLAGS -fno-lto" ;;
-*\ -fwhopr*\ *) CFLAGS="$CFLAGS -fno-whopr" ;;
-*\ -fuse-linker-plugin*\ *) CFLAGS="$CFLAGS -fno-use-linker-plugin" ;;
-esac
-
-dnl Parse the compiler output and extract the necessary
-dnl objects, libraries and library flags.
-if AC_TRY_EVAL(ac_compile); then
-  # Parse the compiler output and extract the necessary
-  # objects, libraries and library flags.
-
-  # Sentinel used to keep track of whether or not we are before
-  # the conftest object file.
-  pre_test_object_deps_done=no
-
-  for p in `eval "$output_verbose_link_cmd"`; do
-    case ${prev}${p} in
-
-    -L* | -R* | -l*)
-       # Some compilers place space between "-{L,R}" and the path.
-       # Remove the space.
-       if test $p = "-L" ||
-          test $p = "-R"; then
-	 prev=$p
-	 continue
-       fi
-
-       # Expand the sysroot to ease extracting the directories later.
-       if test -z "$prev"; then
-         case $p in
-         -L*) func_stripname_cnf '-L' '' "$p"; prev=-L; p=$func_stripname_result ;;
-         -R*) func_stripname_cnf '-R' '' "$p"; prev=-R; p=$func_stripname_result ;;
-         -l*) func_stripname_cnf '-l' '' "$p"; prev=-l; p=$func_stripname_result ;;
-         esac
-       fi
-       case $p in
-       =*) func_stripname_cnf '=' '' "$p"; p=$lt_sysroot$func_stripname_result ;;
-       esac
-       if test "$pre_test_object_deps_done" = no; then
-	 case ${prev} in
-	 -L | -R)
-	   # Internal compiler library paths should come after those
-	   # provided the user.  The postdeps already come after the
-	   # user supplied libs so there is no need to process them.
-	   if test -z "$_LT_TAGVAR(compiler_lib_search_path, $1)"; then
-	     _LT_TAGVAR(compiler_lib_search_path, $1)="${prev}${p}"
-	   else
-	     _LT_TAGVAR(compiler_lib_search_path, $1)="${_LT_TAGVAR(compiler_lib_search_path, $1)} ${prev}${p}"
-	   fi
-	   ;;
-	 # The "-l" case would never come before the object being
-	 # linked, so don't bother handling this case.
-	 esac
-       else
-	 if test -z "$_LT_TAGVAR(postdeps, $1)"; then
-	   _LT_TAGVAR(postdeps, $1)="${prev}${p}"
-	 else
-	   _LT_TAGVAR(postdeps, $1)="${_LT_TAGVAR(postdeps, $1)} ${prev}${p}"
-	 fi
-       fi
-       prev=
-       ;;
-
-    *.lto.$objext) ;; # Ignore GCC LTO objects
-    *.$objext)
-       # This assumes that the test object file only shows up
-       # once in the compiler output.
-       if test "$p" = "conftest.$objext"; then
-	 pre_test_object_deps_done=yes
-	 continue
-       fi
-
-       if test "$pre_test_object_deps_done" = no; then
-	 if test -z "$_LT_TAGVAR(predep_objects, $1)"; then
-	   _LT_TAGVAR(predep_objects, $1)="$p"
-	 else
-	   _LT_TAGVAR(predep_objects, $1)="$_LT_TAGVAR(predep_objects, $1) $p"
-	 fi
-       else
-	 if test -z "$_LT_TAGVAR(postdep_objects, $1)"; then
-	   _LT_TAGVAR(postdep_objects, $1)="$p"
-	 else
-	   _LT_TAGVAR(postdep_objects, $1)="$_LT_TAGVAR(postdep_objects, $1) $p"
-	 fi
-       fi
-       ;;
-
-    *) ;; # Ignore the rest.
-
-    esac
-  done
-
-  # Clean up.
-  rm -f a.out a.exe
-else
-  echo "libtool.m4: error: problem compiling $1 test program"
-fi
-
-$RM -f confest.$objext
-CFLAGS=$_lt_libdeps_save_CFLAGS
-
-# PORTME: override above test on systems where it is broken
-m4_if([$1], [CXX],
-[case $host_os in
-interix[[3-9]]*)
-  # Interix 3.5 installs completely hosed .la files for C++, so rather than
-  # hack all around it, let's just trust "g++" to DTRT.
-  _LT_TAGVAR(predep_objects,$1)=
-  _LT_TAGVAR(postdep_objects,$1)=
-  _LT_TAGVAR(postdeps,$1)=
-  ;;
-
-linux*)
-  case `$CC -V 2>&1 | sed 5q` in
-  *Sun\ C*)
-    # Sun C++ 5.9
-
-    # The more standards-conforming stlport4 library is
-    # incompatible with the Cstd library. Avoid specifying
-    # it if it's in CXXFLAGS. Ignore libCrun as
-    # -library=stlport4 depends on it.
-    case " $CXX $CXXFLAGS " in
-    *" -library=stlport4 "*)
-      solaris_use_stlport4=yes
-      ;;
-    esac
-
-    if test "$solaris_use_stlport4" != yes; then
-      _LT_TAGVAR(postdeps,$1)='-library=Cstd -library=Crun'
-    fi
-    ;;
-  esac
-  ;;
-
-solaris*)
-  case $cc_basename in
-  CC* | sunCC*)
-    # The more standards-conforming stlport4 library is
-    # incompatible with the Cstd library. Avoid specifying
-    # it if it's in CXXFLAGS. Ignore libCrun as
-    # -library=stlport4 depends on it.
-    case " $CXX $CXXFLAGS " in
-    *" -library=stlport4 "*)
-      solaris_use_stlport4=yes
-      ;;
-    esac
-
-    # Adding this requires a known-good setup of shared libraries for
-    # Sun compiler versions before 5.6, else PIC objects from an old
-    # archive will be linked into the output, leading to subtle bugs.
-    if test "$solaris_use_stlport4" != yes; then
-      _LT_TAGVAR(postdeps,$1)='-library=Cstd -library=Crun'
-    fi
-    ;;
-  esac
-  ;;
-esac
-])
-
-case " $_LT_TAGVAR(postdeps, $1) " in
-*" -lc "*) _LT_TAGVAR(archive_cmds_need_lc, $1)=no ;;
-esac
- _LT_TAGVAR(compiler_lib_search_dirs, $1)=
-if test -n "${_LT_TAGVAR(compiler_lib_search_path, $1)}"; then
- _LT_TAGVAR(compiler_lib_search_dirs, $1)=`echo " ${_LT_TAGVAR(compiler_lib_search_path, $1)}" | ${SED} -e 's! -L! !g' -e 's!^ !!'`
-fi
-_LT_TAGDECL([], [compiler_lib_search_dirs], [1],
-    [The directories searched by this compiler when creating a shared library])
-_LT_TAGDECL([], [predep_objects], [1],
-    [Dependencies to place before and after the objects being linked to
-    create a shared library])
-_LT_TAGDECL([], [postdep_objects], [1])
-_LT_TAGDECL([], [predeps], [1])
-_LT_TAGDECL([], [postdeps], [1])
-_LT_TAGDECL([], [compiler_lib_search_path], [1],
-    [The library search path used internally by the compiler when linking
-    a shared library])
-])# _LT_SYS_HIDDEN_LIBDEPS
-
-
-# _LT_LANG_F77_CONFIG([TAG])
-# --------------------------
-# Ensure that the configuration variables for a Fortran 77 compiler are
-# suitably defined.  These variables are subsequently used by _LT_CONFIG
-# to write the compiler configuration to `libtool'.
-m4_defun([_LT_LANG_F77_CONFIG],
-[AC_LANG_PUSH(Fortran 77)
-if test -z "$F77" || test "X$F77" = "Xno"; then
-  _lt_disable_F77=yes
-fi
-
-_LT_TAGVAR(archive_cmds_need_lc, $1)=no
-_LT_TAGVAR(allow_undefined_flag, $1)=
-_LT_TAGVAR(always_export_symbols, $1)=no
-_LT_TAGVAR(archive_expsym_cmds, $1)=
-_LT_TAGVAR(export_dynamic_flag_spec, $1)=
-_LT_TAGVAR(hardcode_direct, $1)=no
-_LT_TAGVAR(hardcode_direct_absolute, $1)=no
-_LT_TAGVAR(hardcode_libdir_flag_spec, $1)=
-_LT_TAGVAR(hardcode_libdir_separator, $1)=
-_LT_TAGVAR(hardcode_minus_L, $1)=no
-_LT_TAGVAR(hardcode_automatic, $1)=no
-_LT_TAGVAR(inherit_rpath, $1)=no
-_LT_TAGVAR(module_cmds, $1)=
-_LT_TAGVAR(module_expsym_cmds, $1)=
-_LT_TAGVAR(link_all_deplibs, $1)=unknown
-_LT_TAGVAR(old_archive_cmds, $1)=$old_archive_cmds
-_LT_TAGVAR(reload_flag, $1)=$reload_flag
-_LT_TAGVAR(reload_cmds, $1)=$reload_cmds
-_LT_TAGVAR(no_undefined_flag, $1)=
-_LT_TAGVAR(whole_archive_flag_spec, $1)=
-_LT_TAGVAR(enable_shared_with_static_runtimes, $1)=no
-
-# Source file extension for f77 test sources.
-ac_ext=f
-
-# Object file extension for compiled f77 test sources.
-objext=o
-_LT_TAGVAR(objext, $1)=$objext
-
-# No sense in running all these tests if we already determined that
-# the F77 compiler isn't working.  Some variables (like enable_shared)
-# are currently assumed to apply to all compilers on this platform,
-# and will be corrupted by setting them based on a non-working compiler.
-if test "$_lt_disable_F77" != yes; then
-  # Code to be used in simple compile tests
-  lt_simple_compile_test_code="\
-      subroutine t
-      return
-      end
-"
-
-  # Code to be used in simple link tests
-  lt_simple_link_test_code="\
-      program t
-      end
-"
-
-  # ltmain only uses $CC for tagged configurations so make sure $CC is set.
-  _LT_TAG_COMPILER
-
-  # save warnings/boilerplate of simple test code
-  _LT_COMPILER_BOILERPLATE
-  _LT_LINKER_BOILERPLATE
-
-  # Allow CC to be a program name with arguments.
-  lt_save_CC="$CC"
-  lt_save_GCC=$GCC
-  lt_save_CFLAGS=$CFLAGS
-  CC=${F77-"f77"}
-  CFLAGS=$FFLAGS
-  compiler=$CC
-  _LT_TAGVAR(compiler, $1)=$CC
-  _LT_CC_BASENAME([$compiler])
-  GCC=$G77
-  if test -n "$compiler"; then
-    AC_MSG_CHECKING([if libtool supports shared libraries])
-    AC_MSG_RESULT([$can_build_shared])
-
-    AC_MSG_CHECKING([whether to build shared libraries])
-    test "$can_build_shared" = "no" && enable_shared=no
-
-    # On AIX, shared libraries and static libraries use the same namespace, and
-    # are all built from PIC.
-    case $host_os in
-      aix3*)
-        test "$enable_shared" = yes && enable_static=no
-        if test -n "$RANLIB"; then
-          archive_cmds="$archive_cmds~\$RANLIB \$lib"
-          postinstall_cmds='$RANLIB $lib'
-        fi
-        ;;
-      aix[[4-9]]*)
-	if test "$host_cpu" != ia64 && test "$aix_use_runtimelinking" = no ; then
-	  test "$enable_shared" = yes && enable_static=no
-	fi
-        ;;
-    esac
-    AC_MSG_RESULT([$enable_shared])
-
-    AC_MSG_CHECKING([whether to build static libraries])
-    # Make sure either enable_shared or enable_static is yes.
-    test "$enable_shared" = yes || enable_static=yes
-    AC_MSG_RESULT([$enable_static])
-
-    _LT_TAGVAR(GCC, $1)="$G77"
-    _LT_TAGVAR(LD, $1)="$LD"
-
-    ## CAVEAT EMPTOR:
-    ## There is no encapsulation within the following macros, do not change
-    ## the running order or otherwise move them around unless you know exactly
-    ## what you are doing...
-    _LT_COMPILER_PIC($1)
-    _LT_COMPILER_C_O($1)
-    _LT_COMPILER_FILE_LOCKS($1)
-    _LT_LINKER_SHLIBS($1)
-    _LT_SYS_DYNAMIC_LINKER($1)
-    _LT_LINKER_HARDCODE_LIBPATH($1)
-
-    _LT_CONFIG($1)
-  fi # test -n "$compiler"
-
-  GCC=$lt_save_GCC
-  CC="$lt_save_CC"
-  CFLAGS="$lt_save_CFLAGS"
-fi # test "$_lt_disable_F77" != yes
-
-AC_LANG_POP
-])# _LT_LANG_F77_CONFIG
-
-
-# _LT_LANG_FC_CONFIG([TAG])
-# -------------------------
-# Ensure that the configuration variables for a Fortran compiler are
-# suitably defined.  These variables are subsequently used by _LT_CONFIG
-# to write the compiler configuration to `libtool'.
-m4_defun([_LT_LANG_FC_CONFIG],
-[AC_LANG_PUSH(Fortran)
-
-if test -z "$FC" || test "X$FC" = "Xno"; then
-  _lt_disable_FC=yes
-fi
-
-_LT_TAGVAR(archive_cmds_need_lc, $1)=no
-_LT_TAGVAR(allow_undefined_flag, $1)=
-_LT_TAGVAR(always_export_symbols, $1)=no
-_LT_TAGVAR(archive_expsym_cmds, $1)=
-_LT_TAGVAR(export_dynamic_flag_spec, $1)=
-_LT_TAGVAR(hardcode_direct, $1)=no
-_LT_TAGVAR(hardcode_direct_absolute, $1)=no
-_LT_TAGVAR(hardcode_libdir_flag_spec, $1)=
-_LT_TAGVAR(hardcode_libdir_separator, $1)=
-_LT_TAGVAR(hardcode_minus_L, $1)=no
-_LT_TAGVAR(hardcode_automatic, $1)=no
-_LT_TAGVAR(inherit_rpath, $1)=no
-_LT_TAGVAR(module_cmds, $1)=
-_LT_TAGVAR(module_expsym_cmds, $1)=
-_LT_TAGVAR(link_all_deplibs, $1)=unknown
-_LT_TAGVAR(old_archive_cmds, $1)=$old_archive_cmds
-_LT_TAGVAR(reload_flag, $1)=$reload_flag
-_LT_TAGVAR(reload_cmds, $1)=$reload_cmds
-_LT_TAGVAR(no_undefined_flag, $1)=
-_LT_TAGVAR(whole_archive_flag_spec, $1)=
-_LT_TAGVAR(enable_shared_with_static_runtimes, $1)=no
-
-# Source file extension for fc test sources.
-ac_ext=${ac_fc_srcext-f}
-
-# Object file extension for compiled fc test sources.
-objext=o
-_LT_TAGVAR(objext, $1)=$objext
-
-# No sense in running all these tests if we already determined that
-# the FC compiler isn't working.  Some variables (like enable_shared)
-# are currently assumed to apply to all compilers on this platform,
-# and will be corrupted by setting them based on a non-working compiler.
-if test "$_lt_disable_FC" != yes; then
-  # Code to be used in simple compile tests
-  lt_simple_compile_test_code="\
-      subroutine t
-      return
-      end
-"
-
-  # Code to be used in simple link tests
-  lt_simple_link_test_code="\
-      program t
-      end
-"
-
-  # ltmain only uses $CC for tagged configurations so make sure $CC is set.
-  _LT_TAG_COMPILER
-
-  # save warnings/boilerplate of simple test code
-  _LT_COMPILER_BOILERPLATE
-  _LT_LINKER_BOILERPLATE
-
-  # Allow CC to be a program name with arguments.
-  lt_save_CC="$CC"
-  lt_save_GCC=$GCC
-  lt_save_CFLAGS=$CFLAGS
-  CC=${FC-"f95"}
-  CFLAGS=$FCFLAGS
-  compiler=$CC
-  GCC=$ac_cv_fc_compiler_gnu
-
-  _LT_TAGVAR(compiler, $1)=$CC
-  _LT_CC_BASENAME([$compiler])
-
-  if test -n "$compiler"; then
-    AC_MSG_CHECKING([if libtool supports shared libraries])
-    AC_MSG_RESULT([$can_build_shared])
-
-    AC_MSG_CHECKING([whether to build shared libraries])
-    test "$can_build_shared" = "no" && enable_shared=no
-
-    # On AIX, shared libraries and static libraries use the same namespace, and
-    # are all built from PIC.
-    case $host_os in
-      aix3*)
-        test "$enable_shared" = yes && enable_static=no
-        if test -n "$RANLIB"; then
-          archive_cmds="$archive_cmds~\$RANLIB \$lib"
-          postinstall_cmds='$RANLIB $lib'
-        fi
-        ;;
-      aix[[4-9]]*)
-	if test "$host_cpu" != ia64 && test "$aix_use_runtimelinking" = no ; then
-	  test "$enable_shared" = yes && enable_static=no
-	fi
-        ;;
-    esac
-    AC_MSG_RESULT([$enable_shared])
-
-    AC_MSG_CHECKING([whether to build static libraries])
-    # Make sure either enable_shared or enable_static is yes.
-    test "$enable_shared" = yes || enable_static=yes
-    AC_MSG_RESULT([$enable_static])
-
-    _LT_TAGVAR(GCC, $1)="$ac_cv_fc_compiler_gnu"
-    _LT_TAGVAR(LD, $1)="$LD"
-
-    ## CAVEAT EMPTOR:
-    ## There is no encapsulation within the following macros, do not change
-    ## the running order or otherwise move them around unless you know exactly
-    ## what you are doing...
-    _LT_SYS_HIDDEN_LIBDEPS($1)
-    _LT_COMPILER_PIC($1)
-    _LT_COMPILER_C_O($1)
-    _LT_COMPILER_FILE_LOCKS($1)
-    _LT_LINKER_SHLIBS($1)
-    _LT_SYS_DYNAMIC_LINKER($1)
-    _LT_LINKER_HARDCODE_LIBPATH($1)
-
-    _LT_CONFIG($1)
-  fi # test -n "$compiler"
-
-  GCC=$lt_save_GCC
-  CC=$lt_save_CC
-  CFLAGS=$lt_save_CFLAGS
-fi # test "$_lt_disable_FC" != yes
-
-AC_LANG_POP
-])# _LT_LANG_FC_CONFIG
-
-
-# _LT_LANG_GCJ_CONFIG([TAG])
-# --------------------------
-# Ensure that the configuration variables for the GNU Java Compiler compiler
-# are suitably defined.  These variables are subsequently used by _LT_CONFIG
-# to write the compiler configuration to `libtool'.
-m4_defun([_LT_LANG_GCJ_CONFIG],
-[AC_REQUIRE([LT_PROG_GCJ])dnl
-AC_LANG_SAVE
-
-# Source file extension for Java test sources.
-ac_ext=java
-
-# Object file extension for compiled Java test sources.
-objext=o
-_LT_TAGVAR(objext, $1)=$objext
-
-# Code to be used in simple compile tests
-lt_simple_compile_test_code="class foo {}"
-
-# Code to be used in simple link tests
-lt_simple_link_test_code='public class conftest { public static void main(String[[]] argv) {}; }'
-
-# ltmain only uses $CC for tagged configurations so make sure $CC is set.
-_LT_TAG_COMPILER
-
-# save warnings/boilerplate of simple test code
-_LT_COMPILER_BOILERPLATE
-_LT_LINKER_BOILERPLATE
-
-# Allow CC to be a program name with arguments.
-lt_save_CC=$CC
-lt_save_CFLAGS=$CFLAGS
-lt_save_GCC=$GCC
-GCC=yes
-CC=${GCJ-"gcj"}
-CFLAGS=$GCJFLAGS
-compiler=$CC
-_LT_TAGVAR(compiler, $1)=$CC
-_LT_TAGVAR(LD, $1)="$LD"
-_LT_CC_BASENAME([$compiler])
-
-# GCJ did not exist at the time GCC didn't implicitly link libc in.
-_LT_TAGVAR(archive_cmds_need_lc, $1)=no
-
-_LT_TAGVAR(old_archive_cmds, $1)=$old_archive_cmds
-_LT_TAGVAR(reload_flag, $1)=$reload_flag
-_LT_TAGVAR(reload_cmds, $1)=$reload_cmds
-
-## CAVEAT EMPTOR:
-## There is no encapsulation within the following macros, do not change
-## the running order or otherwise move them around unless you know exactly
-## what you are doing...
-if test -n "$compiler"; then
-  _LT_COMPILER_NO_RTTI($1)
-  _LT_COMPILER_PIC($1)
-  _LT_COMPILER_C_O($1)
-  _LT_COMPILER_FILE_LOCKS($1)
-  _LT_LINKER_SHLIBS($1)
-  _LT_LINKER_HARDCODE_LIBPATH($1)
-
-  _LT_CONFIG($1)
-fi
-
-AC_LANG_RESTORE
-
-GCC=$lt_save_GCC
-CC=$lt_save_CC
-CFLAGS=$lt_save_CFLAGS
-])# _LT_LANG_GCJ_CONFIG
-
-
-# _LT_LANG_GO_CONFIG([TAG])
-# --------------------------
-# Ensure that the configuration variables for the GNU Go compiler
-# are suitably defined.  These variables are subsequently used by _LT_CONFIG
-# to write the compiler configuration to `libtool'.
-m4_defun([_LT_LANG_GO_CONFIG],
-[AC_REQUIRE([LT_PROG_GO])dnl
-AC_LANG_SAVE
-
-# Source file extension for Go test sources.
-ac_ext=go
-
-# Object file extension for compiled Go test sources.
-objext=o
-_LT_TAGVAR(objext, $1)=$objext
-
-# Code to be used in simple compile tests
-lt_simple_compile_test_code="package main; func main() { }"
-
-# Code to be used in simple link tests
-lt_simple_link_test_code='package main; func main() { }'
-
-# ltmain only uses $CC for tagged configurations so make sure $CC is set.
-_LT_TAG_COMPILER
-
-# save warnings/boilerplate of simple test code
-_LT_COMPILER_BOILERPLATE
-_LT_LINKER_BOILERPLATE
-
-# Allow CC to be a program name with arguments.
-lt_save_CC=$CC
-lt_save_CFLAGS=$CFLAGS
-lt_save_GCC=$GCC
-GCC=yes
-CC=${GOC-"gccgo"}
-CFLAGS=$GOFLAGS
-compiler=$CC
-_LT_TAGVAR(compiler, $1)=$CC
-_LT_TAGVAR(LD, $1)="$LD"
-_LT_CC_BASENAME([$compiler])
-
-# Go did not exist at the time GCC didn't implicitly link libc in.
-_LT_TAGVAR(archive_cmds_need_lc, $1)=no
-
-_LT_TAGVAR(old_archive_cmds, $1)=$old_archive_cmds
-_LT_TAGVAR(reload_flag, $1)=$reload_flag
-_LT_TAGVAR(reload_cmds, $1)=$reload_cmds
-
-## CAVEAT EMPTOR:
-## There is no encapsulation within the following macros, do not change
-## the running order or otherwise move them around unless you know exactly
-## what you are doing...
-if test -n "$compiler"; then
-  _LT_COMPILER_NO_RTTI($1)
-  _LT_COMPILER_PIC($1)
-  _LT_COMPILER_C_O($1)
-  _LT_COMPILER_FILE_LOCKS($1)
-  _LT_LINKER_SHLIBS($1)
-  _LT_LINKER_HARDCODE_LIBPATH($1)
-
-  _LT_CONFIG($1)
-fi
-
-AC_LANG_RESTORE
-
-GCC=$lt_save_GCC
-CC=$lt_save_CC
-CFLAGS=$lt_save_CFLAGS
-])# _LT_LANG_GO_CONFIG
-
-
-# _LT_LANG_RC_CONFIG([TAG])
-# -------------------------
-# Ensure that the configuration variables for the Windows resource compiler
-# are suitably defined.  These variables are subsequently used by _LT_CONFIG
-# to write the compiler configuration to `libtool'.
-m4_defun([_LT_LANG_RC_CONFIG],
-[AC_REQUIRE([LT_PROG_RC])dnl
-AC_LANG_SAVE
-
-# Source file extension for RC test sources.
-ac_ext=rc
-
-# Object file extension for compiled RC test sources.
-objext=o
-_LT_TAGVAR(objext, $1)=$objext
-
-# Code to be used in simple compile tests
-lt_simple_compile_test_code='sample MENU { MENUITEM "&Soup", 100, CHECKED }'
-
-# Code to be used in simple link tests
-lt_simple_link_test_code="$lt_simple_compile_test_code"
-
-# ltmain only uses $CC for tagged configurations so make sure $CC is set.
-_LT_TAG_COMPILER
-
-# save warnings/boilerplate of simple test code
-_LT_COMPILER_BOILERPLATE
-_LT_LINKER_BOILERPLATE
-
-# Allow CC to be a program name with arguments.
-lt_save_CC="$CC"
-lt_save_CFLAGS=$CFLAGS
-lt_save_GCC=$GCC
-GCC=
-CC=${RC-"windres"}
-CFLAGS=
-compiler=$CC
-_LT_TAGVAR(compiler, $1)=$CC
-_LT_CC_BASENAME([$compiler])
-_LT_TAGVAR(lt_cv_prog_compiler_c_o, $1)=yes
-
-if test -n "$compiler"; then
-  :
-  _LT_CONFIG($1)
-fi
-
-GCC=$lt_save_GCC
-AC_LANG_RESTORE
-CC=$lt_save_CC
-CFLAGS=$lt_save_CFLAGS
-])# _LT_LANG_RC_CONFIG
-
-
-# LT_PROG_GCJ
-# -----------
-AC_DEFUN([LT_PROG_GCJ],
-[m4_ifdef([AC_PROG_GCJ], [AC_PROG_GCJ],
-  [m4_ifdef([A][M_PROG_GCJ], [A][M_PROG_GCJ],
-    [AC_CHECK_TOOL(GCJ, gcj,)
-      test "x${GCJFLAGS+set}" = xset || GCJFLAGS="-g -O2"
-      AC_SUBST(GCJFLAGS)])])[]dnl
-])
-
-# Old name:
-AU_ALIAS([LT_AC_PROG_GCJ], [LT_PROG_GCJ])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([LT_AC_PROG_GCJ], [])
-
-
-# LT_PROG_GO
-# ----------
-AC_DEFUN([LT_PROG_GO],
-[AC_CHECK_TOOL(GOC, gccgo,)
-])
-
-
-# LT_PROG_RC
-# ----------
-AC_DEFUN([LT_PROG_RC],
-[AC_CHECK_TOOL(RC, windres,)
-])
-
-# Old name:
-AU_ALIAS([LT_AC_PROG_RC], [LT_PROG_RC])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([LT_AC_PROG_RC], [])
-
-
-# _LT_DECL_EGREP
-# --------------
-# If we don't have a new enough Autoconf to choose the best grep
-# available, choose the one first in the user's PATH.
-m4_defun([_LT_DECL_EGREP],
-[AC_REQUIRE([AC_PROG_EGREP])dnl
-AC_REQUIRE([AC_PROG_FGREP])dnl
-test -z "$GREP" && GREP=grep
-_LT_DECL([], [GREP], [1], [A grep program that handles long lines])
-_LT_DECL([], [EGREP], [1], [An ERE matcher])
-_LT_DECL([], [FGREP], [1], [A literal string matcher])
-dnl Non-bleeding-edge autoconf doesn't subst GREP, so do it here too
-AC_SUBST([GREP])
-])
-
-
-# _LT_DECL_OBJDUMP
-# --------------
-# If we don't have a new enough Autoconf to choose the best objdump
-# available, choose the one first in the user's PATH.
-m4_defun([_LT_DECL_OBJDUMP],
-[AC_CHECK_TOOL(OBJDUMP, objdump, false)
-test -z "$OBJDUMP" && OBJDUMP=objdump
-_LT_DECL([], [OBJDUMP], [1], [An object symbol dumper])
-AC_SUBST([OBJDUMP])
-])
-
-# _LT_DECL_DLLTOOL
-# ----------------
-# Ensure DLLTOOL variable is set.
-m4_defun([_LT_DECL_DLLTOOL],
-[AC_CHECK_TOOL(DLLTOOL, dlltool, false)
-test -z "$DLLTOOL" && DLLTOOL=dlltool
-_LT_DECL([], [DLLTOOL], [1], [DLL creation program])
-AC_SUBST([DLLTOOL])
-])
-
-# _LT_DECL_SED
-# ------------
-# Check for a fully-functional sed program, that truncates
-# as few characters as possible.  Prefer GNU sed if found.
-m4_defun([_LT_DECL_SED],
-[AC_PROG_SED
-test -z "$SED" && SED=sed
-Xsed="$SED -e 1s/^X//"
-_LT_DECL([], [SED], [1], [A sed program that does not truncate output])
-_LT_DECL([], [Xsed], ["\$SED -e 1s/^X//"],
-    [Sed that helps us avoid accidentally triggering echo(1) options like -n])
-])# _LT_DECL_SED
-
-m4_ifndef([AC_PROG_SED], [
-############################################################
-# NOTE: This macro has been submitted for inclusion into   #
-#  GNU Autoconf as AC_PROG_SED.  When it is available in   #
-#  a released version of Autoconf we should remove this    #
-#  macro and use it instead.                               #
-############################################################
-
-m4_defun([AC_PROG_SED],
-[AC_MSG_CHECKING([for a sed that does not truncate output])
-AC_CACHE_VAL(lt_cv_path_SED,
-[# Loop through the user's path and test for sed and gsed.
-# Then use that list of sed's as ones to test for truncation.
-as_save_IFS=$IFS; IFS=$PATH_SEPARATOR
-for as_dir in $PATH
-do
-  IFS=$as_save_IFS
-  test -z "$as_dir" && as_dir=.
-  for lt_ac_prog in sed gsed; do
-    for ac_exec_ext in '' $ac_executable_extensions; do
-      if $as_executable_p "$as_dir/$lt_ac_prog$ac_exec_ext"; then
-        lt_ac_sed_list="$lt_ac_sed_list $as_dir/$lt_ac_prog$ac_exec_ext"
-      fi
-    done
-  done
-done
-IFS=$as_save_IFS
-lt_ac_max=0
-lt_ac_count=0
-# Add /usr/xpg4/bin/sed as it is typically found on Solaris
-# along with /bin/sed that truncates output.
-for lt_ac_sed in $lt_ac_sed_list /usr/xpg4/bin/sed; do
-  test ! -f $lt_ac_sed && continue
-  cat /dev/null > conftest.in
-  lt_ac_count=0
-  echo $ECHO_N "0123456789$ECHO_C" >conftest.in
-  # Check for GNU sed and select it if it is found.
-  if "$lt_ac_sed" --version 2>&1 < /dev/null | grep 'GNU' > /dev/null; then
-    lt_cv_path_SED=$lt_ac_sed
-    break
-  fi
-  while true; do
-    cat conftest.in conftest.in >conftest.tmp
-    mv conftest.tmp conftest.in
-    cp conftest.in conftest.nl
-    echo >>conftest.nl
-    $lt_ac_sed -e 's/a$//' < conftest.nl >conftest.out || break
-    cmp -s conftest.out conftest.nl || break
-    # 10000 chars as input seems more than enough
-    test $lt_ac_count -gt 10 && break
-    lt_ac_count=`expr $lt_ac_count + 1`
-    if test $lt_ac_count -gt $lt_ac_max; then
-      lt_ac_max=$lt_ac_count
-      lt_cv_path_SED=$lt_ac_sed
-    fi
-  done
-done
-])
-SED=$lt_cv_path_SED
-AC_SUBST([SED])
-AC_MSG_RESULT([$SED])
-])#AC_PROG_SED
-])#m4_ifndef
-
-# Old name:
-AU_ALIAS([LT_AC_PROG_SED], [AC_PROG_SED])
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([LT_AC_PROG_SED], [])
-
-
-# _LT_CHECK_SHELL_FEATURES
-# ------------------------
-# Find out whether the shell is Bourne or XSI compatible,
-# or has some other useful features.
-m4_defun([_LT_CHECK_SHELL_FEATURES],
-[AC_MSG_CHECKING([whether the shell understands some XSI constructs])
-# Try some XSI features
-xsi_shell=no
-( _lt_dummy="a/b/c"
-  test "${_lt_dummy##*/},${_lt_dummy%/*},${_lt_dummy#??}"${_lt_dummy%"$_lt_dummy"}, \
-      = c,a/b,b/c, \
-    && eval 'test $(( 1 + 1 )) -eq 2 \
-    && test "${#_lt_dummy}" -eq 5' ) >/dev/null 2>&1 \
-  && xsi_shell=yes
-AC_MSG_RESULT([$xsi_shell])
-_LT_CONFIG_LIBTOOL_INIT([xsi_shell='$xsi_shell'])
-
-AC_MSG_CHECKING([whether the shell understands "+="])
-lt_shell_append=no
-( foo=bar; set foo baz; eval "$[1]+=\$[2]" && test "$foo" = barbaz ) \
-    >/dev/null 2>&1 \
-  && lt_shell_append=yes
-AC_MSG_RESULT([$lt_shell_append])
-_LT_CONFIG_LIBTOOL_INIT([lt_shell_append='$lt_shell_append'])
-
-if ( (MAIL=60; unset MAIL) || exit) >/dev/null 2>&1; then
-  lt_unset=unset
-else
-  lt_unset=false
-fi
-_LT_DECL([], [lt_unset], [0], [whether the shell understands "unset"])dnl
-
-# test EBCDIC or ASCII
-case `echo X|tr X '\101'` in
- A) # ASCII based system
-    # \n is not interpreted correctly by Solaris 8 /usr/ucb/tr
-  lt_SP2NL='tr \040 \012'
-  lt_NL2SP='tr \015\012 \040\040'
-  ;;
- *) # EBCDIC based system
-  lt_SP2NL='tr \100 \n'
-  lt_NL2SP='tr \r\n \100\100'
-  ;;
-esac
-_LT_DECL([SP2NL], [lt_SP2NL], [1], [turn spaces into newlines])dnl
-_LT_DECL([NL2SP], [lt_NL2SP], [1], [turn newlines into spaces])dnl
-])# _LT_CHECK_SHELL_FEATURES
-
-
-# _LT_PROG_FUNCTION_REPLACE (FUNCNAME, REPLACEMENT-BODY)
-# ------------------------------------------------------
-# In `$cfgfile', look for function FUNCNAME delimited by `^FUNCNAME ()$' and
-# '^} FUNCNAME ', and replace its body with REPLACEMENT-BODY.
-m4_defun([_LT_PROG_FUNCTION_REPLACE],
-[dnl {
-sed -e '/^$1 ()$/,/^} # $1 /c\
-$1 ()\
-{\
-m4_bpatsubsts([$2], [$], [\\], [^\([	 ]\)], [\\\1])
-} # Extended-shell $1 implementation' "$cfgfile" > $cfgfile.tmp \
-  && mv -f "$cfgfile.tmp" "$cfgfile" \
-    || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-test 0 -eq $? || _lt_function_replace_fail=:
-])
-
-
-# _LT_PROG_REPLACE_SHELLFNS
-# -------------------------
-# Replace existing portable implementations of several shell functions with
-# equivalent extended shell implementations where those features are available..
-m4_defun([_LT_PROG_REPLACE_SHELLFNS],
-[if test x"$xsi_shell" = xyes; then
-  _LT_PROG_FUNCTION_REPLACE([func_dirname], [dnl
-    case ${1} in
-      */*) func_dirname_result="${1%/*}${2}" ;;
-      *  ) func_dirname_result="${3}" ;;
-    esac])
-
-  _LT_PROG_FUNCTION_REPLACE([func_basename], [dnl
-    func_basename_result="${1##*/}"])
-
-  _LT_PROG_FUNCTION_REPLACE([func_dirname_and_basename], [dnl
-    case ${1} in
-      */*) func_dirname_result="${1%/*}${2}" ;;
-      *  ) func_dirname_result="${3}" ;;
-    esac
-    func_basename_result="${1##*/}"])
-
-  _LT_PROG_FUNCTION_REPLACE([func_stripname], [dnl
-    # pdksh 5.2.14 does not do ${X%$Y} correctly if both X and Y are
-    # positional parameters, so assign one to ordinary parameter first.
-    func_stripname_result=${3}
-    func_stripname_result=${func_stripname_result#"${1}"}
-    func_stripname_result=${func_stripname_result%"${2}"}])
-
-  _LT_PROG_FUNCTION_REPLACE([func_split_long_opt], [dnl
-    func_split_long_opt_name=${1%%=*}
-    func_split_long_opt_arg=${1#*=}])
-
-  _LT_PROG_FUNCTION_REPLACE([func_split_short_opt], [dnl
-    func_split_short_opt_arg=${1#??}
-    func_split_short_opt_name=${1%"$func_split_short_opt_arg"}])
-
-  _LT_PROG_FUNCTION_REPLACE([func_lo2o], [dnl
-    case ${1} in
-      *.lo) func_lo2o_result=${1%.lo}.${objext} ;;
-      *)    func_lo2o_result=${1} ;;
-    esac])
-
-  _LT_PROG_FUNCTION_REPLACE([func_xform], [    func_xform_result=${1%.*}.lo])
-
-  _LT_PROG_FUNCTION_REPLACE([func_arith], [    func_arith_result=$(( $[*] ))])
-
-  _LT_PROG_FUNCTION_REPLACE([func_len], [    func_len_result=${#1}])
-fi
-
-if test x"$lt_shell_append" = xyes; then
-  _LT_PROG_FUNCTION_REPLACE([func_append], [    eval "${1}+=\\${2}"])
-
-  _LT_PROG_FUNCTION_REPLACE([func_append_quoted], [dnl
-    func_quote_for_eval "${2}"
-dnl m4 expansion turns \\\\ into \\, and then the shell eval turns that into \
-    eval "${1}+=\\\\ \\$func_quote_for_eval_result"])
-
-  # Save a `func_append' function call where possible by direct use of '+='
-  sed -e 's%func_append \([[a-zA-Z_]]\{1,\}\) "%\1+="%g' $cfgfile > $cfgfile.tmp \
-    && mv -f "$cfgfile.tmp" "$cfgfile" \
-      || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-  test 0 -eq $? || _lt_function_replace_fail=:
-else
-  # Save a `func_append' function call even when '+=' is not available
-  sed -e 's%func_append \([[a-zA-Z_]]\{1,\}\) "%\1="$\1%g' $cfgfile > $cfgfile.tmp \
-    && mv -f "$cfgfile.tmp" "$cfgfile" \
-      || (rm -f "$cfgfile" && cp "$cfgfile.tmp" "$cfgfile" && rm -f "$cfgfile.tmp")
-  test 0 -eq $? || _lt_function_replace_fail=:
-fi
-
-if test x"$_lt_function_replace_fail" = x":"; then
-  AC_MSG_WARN([Unable to substitute extended shell functions in $ofile])
-fi
-])
-
-# _LT_PATH_CONVERSION_FUNCTIONS
-# -----------------------------
-# Determine which file name conversion functions should be used by
-# func_to_host_file (and, implicitly, by func_to_host_path).  These are needed
-# for certain cross-compile configurations and native mingw.
-m4_defun([_LT_PATH_CONVERSION_FUNCTIONS],
-[AC_REQUIRE([AC_CANONICAL_HOST])dnl
-AC_REQUIRE([AC_CANONICAL_BUILD])dnl
-AC_MSG_CHECKING([how to convert $build file names to $host format])
-AC_CACHE_VAL(lt_cv_to_host_file_cmd,
-[case $host in
-  *-*-mingw* )
-    case $build in
-      *-*-mingw* ) # actually msys
-        lt_cv_to_host_file_cmd=func_convert_file_msys_to_w32
-        ;;
-      *-*-cygwin* )
-        lt_cv_to_host_file_cmd=func_convert_file_cygwin_to_w32
-        ;;
-      * ) # otherwise, assume *nix
-        lt_cv_to_host_file_cmd=func_convert_file_nix_to_w32
-        ;;
-    esac
-    ;;
-  *-*-cygwin* )
-    case $build in
-      *-*-mingw* ) # actually msys
-        lt_cv_to_host_file_cmd=func_convert_file_msys_to_cygwin
-        ;;
-      *-*-cygwin* )
-        lt_cv_to_host_file_cmd=func_convert_file_noop
-        ;;
-      * ) # otherwise, assume *nix
-        lt_cv_to_host_file_cmd=func_convert_file_nix_to_cygwin
-        ;;
-    esac
-    ;;
-  * ) # unhandled hosts (and "normal" native builds)
-    lt_cv_to_host_file_cmd=func_convert_file_noop
-    ;;
-esac
-])
-to_host_file_cmd=$lt_cv_to_host_file_cmd
-AC_MSG_RESULT([$lt_cv_to_host_file_cmd])
-_LT_DECL([to_host_file_cmd], [lt_cv_to_host_file_cmd],
-         [0], [convert $build file names to $host format])dnl
-
-AC_MSG_CHECKING([how to convert $build file names to toolchain format])
-AC_CACHE_VAL(lt_cv_to_tool_file_cmd,
-[#assume ordinary cross tools, or native build.
-lt_cv_to_tool_file_cmd=func_convert_file_noop
-case $host in
-  *-*-mingw* )
-    case $build in
-      *-*-mingw* ) # actually msys
-        lt_cv_to_tool_file_cmd=func_convert_file_msys_to_w32
-        ;;
-    esac
-    ;;
-esac
-])
-to_tool_file_cmd=$lt_cv_to_tool_file_cmd
-AC_MSG_RESULT([$lt_cv_to_tool_file_cmd])
-_LT_DECL([to_tool_file_cmd], [lt_cv_to_tool_file_cmd],
-         [0], [convert $build files to toolchain format])dnl
-])# _LT_PATH_CONVERSION_FUNCTIONS
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ltoptions.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ltoptions.m4
deleted file mode 100644
index 5d9acd8..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ltoptions.m4
+++ /dev/null
@@ -1,384 +0,0 @@
-# Helper functions for option handling.                    -*- Autoconf -*-
-#
-#   Copyright (C) 2004, 2005, 2007, 2008, 2009 Free Software Foundation,
-#   Inc.
-#   Written by Gary V. Vaughan, 2004
-#
-# This file is free software; the Free Software Foundation gives
-# unlimited permission to copy and/or distribute it, with or without
-# modifications, as long as this notice is preserved.
-
-# serial 7 ltoptions.m4
-
-# This is to help aclocal find these macros, as it can't see m4_define.
-AC_DEFUN([LTOPTIONS_VERSION], [m4_if([1])])
-
-
-# _LT_MANGLE_OPTION(MACRO-NAME, OPTION-NAME)
-# ------------------------------------------
-m4_define([_LT_MANGLE_OPTION],
-[[_LT_OPTION_]m4_bpatsubst($1__$2, [[^a-zA-Z0-9_]], [_])])
-
-
-# _LT_SET_OPTION(MACRO-NAME, OPTION-NAME)
-# ---------------------------------------
-# Set option OPTION-NAME for macro MACRO-NAME, and if there is a
-# matching handler defined, dispatch to it.  Other OPTION-NAMEs are
-# saved as a flag.
-m4_define([_LT_SET_OPTION],
-[m4_define(_LT_MANGLE_OPTION([$1], [$2]))dnl
-m4_ifdef(_LT_MANGLE_DEFUN([$1], [$2]),
-        _LT_MANGLE_DEFUN([$1], [$2]),
-    [m4_warning([Unknown $1 option `$2'])])[]dnl
-])
-
-
-# _LT_IF_OPTION(MACRO-NAME, OPTION-NAME, IF-SET, [IF-NOT-SET])
-# ------------------------------------------------------------
-# Execute IF-SET if OPTION is set, IF-NOT-SET otherwise.
-m4_define([_LT_IF_OPTION],
-[m4_ifdef(_LT_MANGLE_OPTION([$1], [$2]), [$3], [$4])])
-
-
-# _LT_UNLESS_OPTIONS(MACRO-NAME, OPTION-LIST, IF-NOT-SET)
-# -------------------------------------------------------
-# Execute IF-NOT-SET unless all options in OPTION-LIST for MACRO-NAME
-# are set.
-m4_define([_LT_UNLESS_OPTIONS],
-[m4_foreach([_LT_Option], m4_split(m4_normalize([$2])),
-	    [m4_ifdef(_LT_MANGLE_OPTION([$1], _LT_Option),
-		      [m4_define([$0_found])])])[]dnl
-m4_ifdef([$0_found], [m4_undefine([$0_found])], [$3
-])[]dnl
-])
-
-
-# _LT_SET_OPTIONS(MACRO-NAME, OPTION-LIST)
-# ----------------------------------------
-# OPTION-LIST is a space-separated list of Libtool options associated
-# with MACRO-NAME.  If any OPTION has a matching handler declared with
-# LT_OPTION_DEFINE, dispatch to that macro; otherwise complain about
-# the unknown option and exit.
-m4_defun([_LT_SET_OPTIONS],
-[# Set options
-m4_foreach([_LT_Option], m4_split(m4_normalize([$2])),
-    [_LT_SET_OPTION([$1], _LT_Option)])
-
-m4_if([$1],[LT_INIT],[
-  dnl
-  dnl Simply set some default values (i.e off) if boolean options were not
-  dnl specified:
-  _LT_UNLESS_OPTIONS([LT_INIT], [dlopen], [enable_dlopen=no
-  ])
-  _LT_UNLESS_OPTIONS([LT_INIT], [win32-dll], [enable_win32_dll=no
-  ])
-  dnl
-  dnl If no reference was made to various pairs of opposing options, then
-  dnl we run the default mode handler for the pair.  For example, if neither
-  dnl `shared' nor `disable-shared' was passed, we enable building of shared
-  dnl archives by default:
-  _LT_UNLESS_OPTIONS([LT_INIT], [shared disable-shared], [_LT_ENABLE_SHARED])
-  _LT_UNLESS_OPTIONS([LT_INIT], [static disable-static], [_LT_ENABLE_STATIC])
-  _LT_UNLESS_OPTIONS([LT_INIT], [pic-only no-pic], [_LT_WITH_PIC])
-  _LT_UNLESS_OPTIONS([LT_INIT], [fast-install disable-fast-install],
-  		   [_LT_ENABLE_FAST_INSTALL])
-  ])
-])# _LT_SET_OPTIONS
-
-
-## --------------------------------- ##
-## Macros to handle LT_INIT options. ##
-## --------------------------------- ##
-
-# _LT_MANGLE_DEFUN(MACRO-NAME, OPTION-NAME)
-# -----------------------------------------
-m4_define([_LT_MANGLE_DEFUN],
-[[_LT_OPTION_DEFUN_]m4_bpatsubst(m4_toupper([$1__$2]), [[^A-Z0-9_]], [_])])
-
-
-# LT_OPTION_DEFINE(MACRO-NAME, OPTION-NAME, CODE)
-# -----------------------------------------------
-m4_define([LT_OPTION_DEFINE],
-[m4_define(_LT_MANGLE_DEFUN([$1], [$2]), [$3])[]dnl
-])# LT_OPTION_DEFINE
-
-
-# dlopen
-# ------
-LT_OPTION_DEFINE([LT_INIT], [dlopen], [enable_dlopen=yes
-])
-
-AU_DEFUN([AC_LIBTOOL_DLOPEN],
-[_LT_SET_OPTION([LT_INIT], [dlopen])
-AC_DIAGNOSE([obsolete],
-[$0: Remove this warning and the call to _LT_SET_OPTION when you
-put the `dlopen' option into LT_INIT's first parameter.])
-])
-
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_DLOPEN], [])
-
-
-# win32-dll
-# ---------
-# Declare package support for building win32 dll's.
-LT_OPTION_DEFINE([LT_INIT], [win32-dll],
-[enable_win32_dll=yes
-
-case $host in
-*-*-cygwin* | *-*-mingw* | *-*-pw32* | *-*-cegcc*)
-  AC_CHECK_TOOL(AS, as, false)
-  AC_CHECK_TOOL(DLLTOOL, dlltool, false)
-  AC_CHECK_TOOL(OBJDUMP, objdump, false)
-  ;;
-esac
-
-test -z "$AS" && AS=as
-_LT_DECL([], [AS],      [1], [Assembler program])dnl
-
-test -z "$DLLTOOL" && DLLTOOL=dlltool
-_LT_DECL([], [DLLTOOL], [1], [DLL creation program])dnl
-
-test -z "$OBJDUMP" && OBJDUMP=objdump
-_LT_DECL([], [OBJDUMP], [1], [Object dumper program])dnl
-])# win32-dll
-
-AU_DEFUN([AC_LIBTOOL_WIN32_DLL],
-[AC_REQUIRE([AC_CANONICAL_HOST])dnl
-_LT_SET_OPTION([LT_INIT], [win32-dll])
-AC_DIAGNOSE([obsolete],
-[$0: Remove this warning and the call to _LT_SET_OPTION when you
-put the `win32-dll' option into LT_INIT's first parameter.])
-])
-
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_WIN32_DLL], [])
-
-
-# _LT_ENABLE_SHARED([DEFAULT])
-# ----------------------------
-# implement the --enable-shared flag, and supports the `shared' and
-# `disable-shared' LT_INIT options.
-# DEFAULT is either `yes' or `no'.  If omitted, it defaults to `yes'.
-m4_define([_LT_ENABLE_SHARED],
-[m4_define([_LT_ENABLE_SHARED_DEFAULT], [m4_if($1, no, no, yes)])dnl
-AC_ARG_ENABLE([shared],
-    [AS_HELP_STRING([--enable-shared@<:@=PKGS@:>@],
-	[build shared libraries @<:@default=]_LT_ENABLE_SHARED_DEFAULT[@:>@])],
-    [p=${PACKAGE-default}
-    case $enableval in
-    yes) enable_shared=yes ;;
-    no) enable_shared=no ;;
-    *)
-      enable_shared=no
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for pkg in $enableval; do
-	IFS="$lt_save_ifs"
-	if test "X$pkg" = "X$p"; then
-	  enable_shared=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac],
-    [enable_shared=]_LT_ENABLE_SHARED_DEFAULT)
-
-    _LT_DECL([build_libtool_libs], [enable_shared], [0],
-	[Whether or not to build shared libraries])
-])# _LT_ENABLE_SHARED
-
-LT_OPTION_DEFINE([LT_INIT], [shared], [_LT_ENABLE_SHARED([yes])])
-LT_OPTION_DEFINE([LT_INIT], [disable-shared], [_LT_ENABLE_SHARED([no])])
-
-# Old names:
-AC_DEFUN([AC_ENABLE_SHARED],
-[_LT_SET_OPTION([LT_INIT], m4_if([$1], [no], [disable-])[shared])
-])
-
-AC_DEFUN([AC_DISABLE_SHARED],
-[_LT_SET_OPTION([LT_INIT], [disable-shared])
-])
-
-AU_DEFUN([AM_ENABLE_SHARED], [AC_ENABLE_SHARED($@)])
-AU_DEFUN([AM_DISABLE_SHARED], [AC_DISABLE_SHARED($@)])
-
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AM_ENABLE_SHARED], [])
-dnl AC_DEFUN([AM_DISABLE_SHARED], [])
-
-
-
-# _LT_ENABLE_STATIC([DEFAULT])
-# ----------------------------
-# implement the --enable-static flag, and support the `static' and
-# `disable-static' LT_INIT options.
-# DEFAULT is either `yes' or `no'.  If omitted, it defaults to `yes'.
-m4_define([_LT_ENABLE_STATIC],
-[m4_define([_LT_ENABLE_STATIC_DEFAULT], [m4_if($1, no, no, yes)])dnl
-AC_ARG_ENABLE([static],
-    [AS_HELP_STRING([--enable-static@<:@=PKGS@:>@],
-	[build static libraries @<:@default=]_LT_ENABLE_STATIC_DEFAULT[@:>@])],
-    [p=${PACKAGE-default}
-    case $enableval in
-    yes) enable_static=yes ;;
-    no) enable_static=no ;;
-    *)
-     enable_static=no
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for pkg in $enableval; do
-	IFS="$lt_save_ifs"
-	if test "X$pkg" = "X$p"; then
-	  enable_static=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac],
-    [enable_static=]_LT_ENABLE_STATIC_DEFAULT)
-
-    _LT_DECL([build_old_libs], [enable_static], [0],
-	[Whether or not to build static libraries])
-])# _LT_ENABLE_STATIC
-
-LT_OPTION_DEFINE([LT_INIT], [static], [_LT_ENABLE_STATIC([yes])])
-LT_OPTION_DEFINE([LT_INIT], [disable-static], [_LT_ENABLE_STATIC([no])])
-
-# Old names:
-AC_DEFUN([AC_ENABLE_STATIC],
-[_LT_SET_OPTION([LT_INIT], m4_if([$1], [no], [disable-])[static])
-])
-
-AC_DEFUN([AC_DISABLE_STATIC],
-[_LT_SET_OPTION([LT_INIT], [disable-static])
-])
-
-AU_DEFUN([AM_ENABLE_STATIC], [AC_ENABLE_STATIC($@)])
-AU_DEFUN([AM_DISABLE_STATIC], [AC_DISABLE_STATIC($@)])
-
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AM_ENABLE_STATIC], [])
-dnl AC_DEFUN([AM_DISABLE_STATIC], [])
-
-
-
-# _LT_ENABLE_FAST_INSTALL([DEFAULT])
-# ----------------------------------
-# implement the --enable-fast-install flag, and support the `fast-install'
-# and `disable-fast-install' LT_INIT options.
-# DEFAULT is either `yes' or `no'.  If omitted, it defaults to `yes'.
-m4_define([_LT_ENABLE_FAST_INSTALL],
-[m4_define([_LT_ENABLE_FAST_INSTALL_DEFAULT], [m4_if($1, no, no, yes)])dnl
-AC_ARG_ENABLE([fast-install],
-    [AS_HELP_STRING([--enable-fast-install@<:@=PKGS@:>@],
-    [optimize for fast installation @<:@default=]_LT_ENABLE_FAST_INSTALL_DEFAULT[@:>@])],
-    [p=${PACKAGE-default}
-    case $enableval in
-    yes) enable_fast_install=yes ;;
-    no) enable_fast_install=no ;;
-    *)
-      enable_fast_install=no
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for pkg in $enableval; do
-	IFS="$lt_save_ifs"
-	if test "X$pkg" = "X$p"; then
-	  enable_fast_install=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac],
-    [enable_fast_install=]_LT_ENABLE_FAST_INSTALL_DEFAULT)
-
-_LT_DECL([fast_install], [enable_fast_install], [0],
-	 [Whether or not to optimize for fast installation])dnl
-])# _LT_ENABLE_FAST_INSTALL
-
-LT_OPTION_DEFINE([LT_INIT], [fast-install], [_LT_ENABLE_FAST_INSTALL([yes])])
-LT_OPTION_DEFINE([LT_INIT], [disable-fast-install], [_LT_ENABLE_FAST_INSTALL([no])])
-
-# Old names:
-AU_DEFUN([AC_ENABLE_FAST_INSTALL],
-[_LT_SET_OPTION([LT_INIT], m4_if([$1], [no], [disable-])[fast-install])
-AC_DIAGNOSE([obsolete],
-[$0: Remove this warning and the call to _LT_SET_OPTION when you put
-the `fast-install' option into LT_INIT's first parameter.])
-])
-
-AU_DEFUN([AC_DISABLE_FAST_INSTALL],
-[_LT_SET_OPTION([LT_INIT], [disable-fast-install])
-AC_DIAGNOSE([obsolete],
-[$0: Remove this warning and the call to _LT_SET_OPTION when you put
-the `disable-fast-install' option into LT_INIT's first parameter.])
-])
-
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_ENABLE_FAST_INSTALL], [])
-dnl AC_DEFUN([AM_DISABLE_FAST_INSTALL], [])
-
-
-# _LT_WITH_PIC([MODE])
-# --------------------
-# implement the --with-pic flag, and support the `pic-only' and `no-pic'
-# LT_INIT options.
-# MODE is either `yes' or `no'.  If omitted, it defaults to `both'.
-m4_define([_LT_WITH_PIC],
-[AC_ARG_WITH([pic],
-    [AS_HELP_STRING([--with-pic@<:@=PKGS@:>@],
-	[try to use only PIC/non-PIC objects @<:@default=use both@:>@])],
-    [lt_p=${PACKAGE-default}
-    case $withval in
-    yes|no) pic_mode=$withval ;;
-    *)
-      pic_mode=default
-      # Look at the argument we got.  We use all the common list separators.
-      lt_save_ifs="$IFS"; IFS="${IFS}$PATH_SEPARATOR,"
-      for lt_pkg in $withval; do
-	IFS="$lt_save_ifs"
-	if test "X$lt_pkg" = "X$lt_p"; then
-	  pic_mode=yes
-	fi
-      done
-      IFS="$lt_save_ifs"
-      ;;
-    esac],
-    [pic_mode=default])
-
-test -z "$pic_mode" && pic_mode=m4_default([$1], [default])
-
-_LT_DECL([], [pic_mode], [0], [What type of objects to build])dnl
-])# _LT_WITH_PIC
-
-LT_OPTION_DEFINE([LT_INIT], [pic-only], [_LT_WITH_PIC([yes])])
-LT_OPTION_DEFINE([LT_INIT], [no-pic], [_LT_WITH_PIC([no])])
-
-# Old name:
-AU_DEFUN([AC_LIBTOOL_PICMODE],
-[_LT_SET_OPTION([LT_INIT], [pic-only])
-AC_DIAGNOSE([obsolete],
-[$0: Remove this warning and the call to _LT_SET_OPTION when you
-put the `pic-only' option into LT_INIT's first parameter.])
-])
-
-dnl aclocal-1.4 backwards compatibility:
-dnl AC_DEFUN([AC_LIBTOOL_PICMODE], [])
-
-## ----------------- ##
-## LTDL_INIT Options ##
-## ----------------- ##
-
-m4_define([_LTDL_MODE], [])
-LT_OPTION_DEFINE([LTDL_INIT], [nonrecursive],
-		 [m4_define([_LTDL_MODE], [nonrecursive])])
-LT_OPTION_DEFINE([LTDL_INIT], [recursive],
-		 [m4_define([_LTDL_MODE], [recursive])])
-LT_OPTION_DEFINE([LTDL_INIT], [subproject],
-		 [m4_define([_LTDL_MODE], [subproject])])
-
-m4_define([_LTDL_TYPE], [])
-LT_OPTION_DEFINE([LTDL_INIT], [installable],
-		 [m4_define([_LTDL_TYPE], [installable])])
-LT_OPTION_DEFINE([LTDL_INIT], [convenience],
-		 [m4_define([_LTDL_TYPE], [convenience])])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ltsugar.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ltsugar.m4
deleted file mode 100644
index 9000a05..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ltsugar.m4
+++ /dev/null
@@ -1,123 +0,0 @@
-# ltsugar.m4 -- libtool m4 base layer.                         -*-Autoconf-*-
-#
-# Copyright (C) 2004, 2005, 2007, 2008 Free Software Foundation, Inc.
-# Written by Gary V. Vaughan, 2004
-#
-# This file is free software; the Free Software Foundation gives
-# unlimited permission to copy and/or distribute it, with or without
-# modifications, as long as this notice is preserved.
-
-# serial 6 ltsugar.m4
-
-# This is to help aclocal find these macros, as it can't see m4_define.
-AC_DEFUN([LTSUGAR_VERSION], [m4_if([0.1])])
-
-
-# lt_join(SEP, ARG1, [ARG2...])
-# -----------------------------
-# Produce ARG1SEPARG2...SEPARGn, omitting [] arguments and their
-# associated separator.
-# Needed until we can rely on m4_join from Autoconf 2.62, since all earlier
-# versions in m4sugar had bugs.
-m4_define([lt_join],
-[m4_if([$#], [1], [],
-       [$#], [2], [[$2]],
-       [m4_if([$2], [], [], [[$2]_])$0([$1], m4_shift(m4_shift($@)))])])
-m4_define([_lt_join],
-[m4_if([$#$2], [2], [],
-       [m4_if([$2], [], [], [[$1$2]])$0([$1], m4_shift(m4_shift($@)))])])
-
-
-# lt_car(LIST)
-# lt_cdr(LIST)
-# ------------
-# Manipulate m4 lists.
-# These macros are necessary as long as will still need to support
-# Autoconf-2.59 which quotes differently.
-m4_define([lt_car], [[$1]])
-m4_define([lt_cdr],
-[m4_if([$#], 0, [m4_fatal([$0: cannot be called without arguments])],
-       [$#], 1, [],
-       [m4_dquote(m4_shift($@))])])
-m4_define([lt_unquote], $1)
-
-
-# lt_append(MACRO-NAME, STRING, [SEPARATOR])
-# ------------------------------------------
-# Redefine MACRO-NAME to hold its former content plus `SEPARATOR'`STRING'.
-# Note that neither SEPARATOR nor STRING are expanded; they are appended
-# to MACRO-NAME as is (leaving the expansion for when MACRO-NAME is invoked).
-# No SEPARATOR is output if MACRO-NAME was previously undefined (different
-# than defined and empty).
-#
-# This macro is needed until we can rely on Autoconf 2.62, since earlier
-# versions of m4sugar mistakenly expanded SEPARATOR but not STRING.
-m4_define([lt_append],
-[m4_define([$1],
-	   m4_ifdef([$1], [m4_defn([$1])[$3]])[$2])])
-
-
-
-# lt_combine(SEP, PREFIX-LIST, INFIX, SUFFIX1, [SUFFIX2...])
-# ----------------------------------------------------------
-# Produce a SEP delimited list of all paired combinations of elements of
-# PREFIX-LIST with SUFFIX1 through SUFFIXn.  Each element of the list
-# has the form PREFIXmINFIXSUFFIXn.
-# Needed until we can rely on m4_combine added in Autoconf 2.62.
-m4_define([lt_combine],
-[m4_if(m4_eval([$# > 3]), [1],
-       [m4_pushdef([_Lt_sep], [m4_define([_Lt_sep], m4_defn([lt_car]))])]]dnl
-[[m4_foreach([_Lt_prefix], [$2],
-	     [m4_foreach([_Lt_suffix],
-		]m4_dquote(m4_dquote(m4_shift(m4_shift(m4_shift($@)))))[,
-	[_Lt_sep([$1])[]m4_defn([_Lt_prefix])[$3]m4_defn([_Lt_suffix])])])])])
-
-
-# lt_if_append_uniq(MACRO-NAME, VARNAME, [SEPARATOR], [UNIQ], [NOT-UNIQ])
-# -----------------------------------------------------------------------
-# Iff MACRO-NAME does not yet contain VARNAME, then append it (delimited
-# by SEPARATOR if supplied) and expand UNIQ, else NOT-UNIQ.
-m4_define([lt_if_append_uniq],
-[m4_ifdef([$1],
-	  [m4_if(m4_index([$3]m4_defn([$1])[$3], [$3$2$3]), [-1],
-		 [lt_append([$1], [$2], [$3])$4],
-		 [$5])],
-	  [lt_append([$1], [$2], [$3])$4])])
-
-
-# lt_dict_add(DICT, KEY, VALUE)
-# -----------------------------
-m4_define([lt_dict_add],
-[m4_define([$1($2)], [$3])])
-
-
-# lt_dict_add_subkey(DICT, KEY, SUBKEY, VALUE)
-# --------------------------------------------
-m4_define([lt_dict_add_subkey],
-[m4_define([$1($2:$3)], [$4])])
-
-
-# lt_dict_fetch(DICT, KEY, [SUBKEY])
-# ----------------------------------
-m4_define([lt_dict_fetch],
-[m4_ifval([$3],
-	m4_ifdef([$1($2:$3)], [m4_defn([$1($2:$3)])]),
-    m4_ifdef([$1($2)], [m4_defn([$1($2)])]))])
-
-
-# lt_if_dict_fetch(DICT, KEY, [SUBKEY], VALUE, IF-TRUE, [IF-FALSE])
-# -----------------------------------------------------------------
-m4_define([lt_if_dict_fetch],
-[m4_if(lt_dict_fetch([$1], [$2], [$3]), [$4],
-	[$5],
-    [$6])])
-
-
-# lt_dict_filter(DICT, [SUBKEY], VALUE, [SEPARATOR], KEY, [...])
-# --------------------------------------------------------------
-m4_define([lt_dict_filter],
-[m4_if([$5], [], [],
-  [lt_join(m4_quote(m4_default([$4], [[, ]])),
-           lt_unquote(m4_split(m4_normalize(m4_foreach(_Lt_key, lt_car([m4_shiftn(4, $@)]),
-		      [lt_if_dict_fetch([$1], _Lt_key, [$2], [$3], [_Lt_key ])])))))])[]dnl
-])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/ltversion.m4 b/sandbox/hurwitz.kroeker/src/float/m4/ltversion.m4
deleted file mode 100644
index 07a8602..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/ltversion.m4
+++ /dev/null
@@ -1,23 +0,0 @@
-# ltversion.m4 -- version numbers			-*- Autoconf -*-
-#
-#   Copyright (C) 2004 Free Software Foundation, Inc.
-#   Written by Scott James Remnant, 2004
-#
-# This file is free software; the Free Software Foundation gives
-# unlimited permission to copy and/or distribute it, with or without
-# modifications, as long as this notice is preserved.
-
-# @configure_input@
-
-# serial 3337 ltversion.m4
-# This file is part of GNU Libtool
-
-m4_define([LT_PACKAGE_VERSION], [2.4.2])
-m4_define([LT_PACKAGE_REVISION], [1.3337])
-
-AC_DEFUN([LTVERSION_VERSION],
-[macro_version='2.4.2'
-macro_revision='1.3337'
-_LT_DECL(, macro_version, 0, [Which release of libtool.m4 was used?])
-_LT_DECL(, macro_revision, 0)
-])
diff --git a/sandbox/hurwitz.kroeker/src/float/m4/lt~obsolete.m4 b/sandbox/hurwitz.kroeker/src/float/m4/lt~obsolete.m4
deleted file mode 100644
index c573da9..0000000
--- a/sandbox/hurwitz.kroeker/src/float/m4/lt~obsolete.m4
+++ /dev/null
@@ -1,98 +0,0 @@
-# lt~obsolete.m4 -- aclocal satisfying obsolete definitions.    -*-Autoconf-*-
-#
-#   Copyright (C) 2004, 2005, 2007, 2009 Free Software Foundation, Inc.
-#   Written by Scott James Remnant, 2004.
-#
-# This file is free software; the Free Software Foundation gives
-# unlimited permission to copy and/or distribute it, with or without
-# modifications, as long as this notice is preserved.
-
-# serial 5 lt~obsolete.m4
-
-# These exist entirely to fool aclocal when bootstrapping libtool.
-#
-# In the past libtool.m4 has provided macros via AC_DEFUN (or AU_DEFUN)
-# which have later been changed to m4_define as they aren't part of the
-# exported API, or moved to Autoconf or Automake where they belong.
-#
-# The trouble is, aclocal is a bit thick.  It'll see the old AC_DEFUN
-# in /usr/share/aclocal/libtool.m4 and remember it, then when it sees us
-# using a macro with the same name in our local m4/libtool.m4 it'll
-# pull the old libtool.m4 in (it doesn't see our shiny new m4_define
-# and doesn't know about Autoconf macros at all.)
-#
-# So we provide this file, which has a silly filename so it's always
-# included after everything else.  This provides aclocal with the
-# AC_DEFUNs it wants, but when m4 processes it, it doesn't do anything
-# because those macros already exist, or will be overwritten later.
-# We use AC_DEFUN over AU_DEFUN for compatibility with aclocal-1.6. 
-#
-# Anytime we withdraw an AC_DEFUN or AU_DEFUN, remember to add it here.
-# Yes, that means every name once taken will need to remain here until
-# we give up compatibility with versions before 1.7, at which point
-# we need to keep only those names which we still refer to.
-
-# This is to help aclocal find these macros, as it can't see m4_define.
-AC_DEFUN([LTOBSOLETE_VERSION], [m4_if([1])])
-
-m4_ifndef([AC_LIBTOOL_LINKER_OPTION],	[AC_DEFUN([AC_LIBTOOL_LINKER_OPTION])])
-m4_ifndef([AC_PROG_EGREP],		[AC_DEFUN([AC_PROG_EGREP])])
-m4_ifndef([_LT_AC_PROG_ECHO_BACKSLASH],	[AC_DEFUN([_LT_AC_PROG_ECHO_BACKSLASH])])
-m4_ifndef([_LT_AC_SHELL_INIT],		[AC_DEFUN([_LT_AC_SHELL_INIT])])
-m4_ifndef([_LT_AC_SYS_LIBPATH_AIX],	[AC_DEFUN([_LT_AC_SYS_LIBPATH_AIX])])
-m4_ifndef([_LT_PROG_LTMAIN],		[AC_DEFUN([_LT_PROG_LTMAIN])])
-m4_ifndef([_LT_AC_TAGVAR],		[AC_DEFUN([_LT_AC_TAGVAR])])
-m4_ifndef([AC_LTDL_ENABLE_INSTALL],	[AC_DEFUN([AC_LTDL_ENABLE_INSTALL])])
-m4_ifndef([AC_LTDL_PREOPEN],		[AC_DEFUN([AC_LTDL_PREOPEN])])
-m4_ifndef([_LT_AC_SYS_COMPILER],	[AC_DEFUN([_LT_AC_SYS_COMPILER])])
-m4_ifndef([_LT_AC_LOCK],		[AC_DEFUN([_LT_AC_LOCK])])
-m4_ifndef([AC_LIBTOOL_SYS_OLD_ARCHIVE],	[AC_DEFUN([AC_LIBTOOL_SYS_OLD_ARCHIVE])])
-m4_ifndef([_LT_AC_TRY_DLOPEN_SELF],	[AC_DEFUN([_LT_AC_TRY_DLOPEN_SELF])])
-m4_ifndef([AC_LIBTOOL_PROG_CC_C_O],	[AC_DEFUN([AC_LIBTOOL_PROG_CC_C_O])])
-m4_ifndef([AC_LIBTOOL_SYS_HARD_LINK_LOCKS], [AC_DEFUN([AC_LIBTOOL_SYS_HARD_LINK_LOCKS])])
-m4_ifndef([AC_LIBTOOL_OBJDIR],		[AC_DEFUN([AC_LIBTOOL_OBJDIR])])
-m4_ifndef([AC_LTDL_OBJDIR],		[AC_DEFUN([AC_LTDL_OBJDIR])])
-m4_ifndef([AC_LIBTOOL_PROG_LD_HARDCODE_LIBPATH], [AC_DEFUN([AC_LIBTOOL_PROG_LD_HARDCODE_LIBPATH])])
-m4_ifndef([AC_LIBTOOL_SYS_LIB_STRIP],	[AC_DEFUN([AC_LIBTOOL_SYS_LIB_STRIP])])
-m4_ifndef([AC_PATH_MAGIC],		[AC_DEFUN([AC_PATH_MAGIC])])
-m4_ifndef([AC_PROG_LD_GNU],		[AC_DEFUN([AC_PROG_LD_GNU])])
-m4_ifndef([AC_PROG_LD_RELOAD_FLAG],	[AC_DEFUN([AC_PROG_LD_RELOAD_FLAG])])
-m4_ifndef([AC_DEPLIBS_CHECK_METHOD],	[AC_DEFUN([AC_DEPLIBS_CHECK_METHOD])])
-m4_ifndef([AC_LIBTOOL_PROG_COMPILER_NO_RTTI], [AC_DEFUN([AC_LIBTOOL_PROG_COMPILER_NO_RTTI])])
-m4_ifndef([AC_LIBTOOL_SYS_GLOBAL_SYMBOL_PIPE], [AC_DEFUN([AC_LIBTOOL_SYS_GLOBAL_SYMBOL_PIPE])])
-m4_ifndef([AC_LIBTOOL_PROG_COMPILER_PIC], [AC_DEFUN([AC_LIBTOOL_PROG_COMPILER_PIC])])
-m4_ifndef([AC_LIBTOOL_PROG_LD_SHLIBS],	[AC_DEFUN([AC_LIBTOOL_PROG_LD_SHLIBS])])
-m4_ifndef([AC_LIBTOOL_POSTDEP_PREDEP],	[AC_DEFUN([AC_LIBTOOL_POSTDEP_PREDEP])])
-m4_ifndef([LT_AC_PROG_EGREP],		[AC_DEFUN([LT_AC_PROG_EGREP])])
-m4_ifndef([LT_AC_PROG_SED],		[AC_DEFUN([LT_AC_PROG_SED])])
-m4_ifndef([_LT_CC_BASENAME],		[AC_DEFUN([_LT_CC_BASENAME])])
-m4_ifndef([_LT_COMPILER_BOILERPLATE],	[AC_DEFUN([_LT_COMPILER_BOILERPLATE])])
-m4_ifndef([_LT_LINKER_BOILERPLATE],	[AC_DEFUN([_LT_LINKER_BOILERPLATE])])
-m4_ifndef([_AC_PROG_LIBTOOL],		[AC_DEFUN([_AC_PROG_LIBTOOL])])
-m4_ifndef([AC_LIBTOOL_SETUP],		[AC_DEFUN([AC_LIBTOOL_SETUP])])
-m4_ifndef([_LT_AC_CHECK_DLFCN],		[AC_DEFUN([_LT_AC_CHECK_DLFCN])])
-m4_ifndef([AC_LIBTOOL_SYS_DYNAMIC_LINKER],	[AC_DEFUN([AC_LIBTOOL_SYS_DYNAMIC_LINKER])])
-m4_ifndef([_LT_AC_TAGCONFIG],		[AC_DEFUN([_LT_AC_TAGCONFIG])])
-m4_ifndef([AC_DISABLE_FAST_INSTALL],	[AC_DEFUN([AC_DISABLE_FAST_INSTALL])])
-m4_ifndef([_LT_AC_LANG_CXX],		[AC_DEFUN([_LT_AC_LANG_CXX])])
-m4_ifndef([_LT_AC_LANG_F77],		[AC_DEFUN([_LT_AC_LANG_F77])])
-m4_ifndef([_LT_AC_LANG_GCJ],		[AC_DEFUN([_LT_AC_LANG_GCJ])])
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-m4_ifndef([_LT_AC_LANG_C_CONFIG],	[AC_DEFUN([_LT_AC_LANG_C_CONFIG])])
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diff --git a/sandbox/hurwitz.kroeker/src/hmfTypedefs.h b/sandbox/hurwitz.kroeker/src/hmfTypedefs.h
deleted file mode 100644
index cd9e238..0000000
--- a/sandbox/hurwitz.kroeker/src/hmfTypedefs.h
+++ /dev/null
@@ -1,42 +0,0 @@
-#pragma once
-
-#include <assert.h>
-#include <iostream>
-#include <cstdio>
-#include <string>
-
-#include "fast_Ring.h"
-#include "fastNumber.h"
-#include "typedefs.h"
-#include "polynomdefs.h"
-
-
-#include "random.h"
-#include "basicNumber.h"
-#include "fastNumber.h"
-
-#include "polynomialRing.h"
-
-#include <algorithm>
-#include <map>
-
-typedef std::map<std::string, int64_t> HashMapType;
-
-#ifndef HURWITZ_MAXCHAR
-    #define HURWITZ_MAXCHAR  123
-#endif
-
-#ifndef HURWITZ_SCALARTYPE
-    #define HURWITZ_SCALARTYPE int8_t
-#endif
-
-typedef number_eps0< HURWITZ_MAXCHAR, HURWITZ_SCALARTYPE >  CoeffType   ;
-
-#include "polynom.h"
-
-typedef fast_Ring< CoeffType, kdefs_zahl_x < HURWITZ_MAXCHAR ,0 > >   defined_Field_Type;
-
-typedef UnivariatePolynomialRing< polynomx<defined_Field_Type::ElementType > ,defined_Field_Type > TPolRingType;
-
-// TPolFactorPowerType::first: polynomial, TPolFactorPowerType::second: exponent
-typedef   std::pair<TPolRingType::Element , uint>         TPolFactorPowerType;
diff --git a/sandbox/hurwitz.kroeker/src/parseTools.h b/sandbox/hurwitz.kroeker/src/parseTools.h
deleted file mode 100644
index e9a0b77..0000000
--- a/sandbox/hurwitz.kroeker/src/parseTools.h
+++ /dev/null
@@ -1,893 +0,0 @@
-
-#pragma once
-
-
-#include <string>
-#include <assert.h>
-#include <sstream>
-#include <vector>
-#include <iostream>
-#include <string.h>
-
-
-/** \file parseTools.h
- *   @brief  input file and input stream parsing utils
- * @todo die Datei  ist bestimmt noch voller Fehler... (fail-test, potenzielle Segfaults, string escaping, Kommentare in der Eingabedatei, etc.)
-*/
-
-
-
-
-//--------------------------Parser Kram ----------------------------------------------
-
-/** @brief  jumps over next whitespaces series in the string 'str', starting at position 'stelle'. *
- The position is then set to the next first position with a non-whitespace char 
-*/
-inline void 		eatWS(char* str, unsigned int & stelle);
-
-
-/** @brief 'eats' leading whitespaces in the string str, and returns the result string
- */
-inline std::string 	eatWS(const std::string &str);
-
-
-/** @brief extracts given char from a stream, throws an error, if failed
- */
-template <class _istream>
-char 		extractChar(char schar, _istream& sstream);
-
-/*
-template <class _istream>
-char 		extractChar(char schar, std::string  str)
-{
-	//std::stringstream strstream(str);
-	//extractChar(schar,strstream );
-	//str=strstream.str();
-	return schar;
-}
-*/
-
-/** @brief extracts given char from a stream, throws an error, if failed
- */
-template <class _istream>
-char 		extractChar(_istream& sstream, char schar);
-
-
-/** @brief extracts a '-' or '+' from sstream if possible, and returns -1 if '-' , otherwise 1.
- */
-template <class _istream>
-int 		getSign(_istream& sstream);
-
-
-/** @brief if leading stream entries is a Macaulay-comment sequence, the function strips all chars until next line starts .
-
-if leading stream entries are  \verbatim '--'  (Macaulay-comment) \endverbatim, strips all chars until next line starts (after \verbatim '\n' or '\r' \endverbatim).
- */
-template <class _istream>
-std::string 	stripComment(_istream& data, bool & isComment);
-
-
-/** @brief jumps over Macaulay-comments  \verbatim '--' \endverbatim ,until a non-comment char occurs in the input stream
- */
-template <class _istream>
-void 		stripComments(_istream& data);
-
-
-/** @brief try to read a comment from input stream. Comment starts with two  \verbatim '--' \endverbatim. Whether  comment reading was successful, return value 
- contains the extracted comment string, otherwise the return value is empty. 
- */
-template <class _istream>
-std::string 	readCurrentComment(_istream& data);
-
-
-/** @brief seeks tho given braceLevel in the input stream if possible.
-      Needs information about currentBraceLevel, which is also kept up to date */
-template <class _istream>
-void 		seekToBraceLevel(_istream & inputData, int &currentLevel, int braceLevel);
-
-
-/** @brief extracts data until ',' of '}' at current brace level occur. Comments ( \verbatim '--' \endverbatim) are stripped
- */
-inline std::string extractNextData(std::stringstream &Data);
-
-
-/** @brief  extracts data starting with '{'  until of '}' at current brace level occurs.
- */
-inline std::string extractNextBracedData(std::stringstream &Data);
-
-
-/** @brief  Reads Macaulay parameter name in current line. Assumption: the input stream points 
-            to first char of a parameter name (whitespaces are ignored). Parameter name ends with '='.*/
-template <class _istream>
-std::string 	readParamName(_istream & inputData);
-
-
-/** @brief  Reads macaulay parameter value in current line. Assumption: the input stream points 
-            to first char of a parameter name (whitespaces are ignored). Parameter name ends with '='. */
-template <class _istream>
-std::string 	readParamValue(_istream & inputData, std::string name);
-
-
-/** @brief  count subgroups in braces,  example: count result for "{1,2,{..}}"-stream  is 1. 
-	   Assumes, that comments are already stripped. Inside string are currently not handled.
-*/
-inline int 	countSubGroups(std::stringstream &polynomStream);
-
-
-/** @brief  count groups in braces,  example: count result for "{1,2,{..}},{...},{...},{...}"-stream  is 4.
-            Assumes, that comments are already stripped. Inside string are currently not handled.
-*/
-inline int 	countGroups(std::stringstream &polynomStream);
-
-
-/** @brief  count elements in braces,  example: count result for "{1,2,{4,5}}"-stream  is 3. 
-           Assumes, that comments are already stripped. Inside string are currently not handled.
-*/
-
-inline int 	countElements(std::stringstream &str);
-
-//-------------------------------------------------------------------------------------------------------------
-
-/** @brief reads scalar from string <b>strNum</b> with following format: \code <num>+<num>*e^1++<num>*e^2+... \endcode
- *  and converts result before returning in a element of Ring <b>ring1</b> 
- *  with maximal possible epsPrecision<=<b>_epsPrecision</b> for template class <b>RingType::ElementType</b>
- * 
- * from <b>kk</b> only one thing is important: the convert-function. 
- @todo evtl. weitere Verbesserung: ein Element kann sich selbst aus einem String einlesen.
-Dabei ist aber zu beachten, dass hier eventuell  epsPrecision eingeschraenkt werden soll (Parameter _epsPrecision)
-Eine weitere Moeglichkeit besteht darin, den Ring in dieser Funktion zu erzeugen. 
-*/
-template <class RingType>
-typename RingType::ElementType	 parseNumber(RingType* ring1, std::string strNum, int _epsPrecision )
-{
-	std::stringstream ssNum;
-	ssNum << strNum;
-
-	// erzeute ein Element mit vorgegebener epsPrecsion.
-	typename RingType::ElementType erg(_epsPrecision, "dummy");
-	//=createNum<TNum>(_epsPrecision);
-	
-	assert(erg.getEpsPrecision()>=_epsPrecision);
-
-	
-	//    Algoritmus: solange nicht ganzen string ausgelesen:
-	//	      solange weiterer Summand{
-	//           -lese {Vorzeichen,SummandKoeff}
-	//           -lese epspotenz(Summand)
-	//           -addiere Summand zu erg, falls epspotenz<=_epsPrecision
-	//	}
-	//      -Wandle das Ganze in trage Ziffer in erg ein 
-
-	while (!ssNum.fail() && !ssNum.eof())
-	{
-		int number=1;
-
-		int sign=getSign(ssNum);
- 		if (ssNum.peek()!='e')
-			ssNum >> number;
-		number=number*sign;
-
-		////end  read coefficient
-		//// read epsPrecision
-		int precision=0;
-
-		// wenn es eine epsZahl ist, muss jetzt '*' folgen
-		if (!ssNum.eof() && ( ssNum.peek()=='*' || ssNum.peek()=='e')) // soll * weggelassen werden koennen???
-		{
-			// assert nicht gut... Programm sollte wenigstens zu Ende Laufen, wenn ein Polynom
-			// nicht eingelesen werden kann. Oder zu Beginn sollten testweise alle Polynome eingelesen werden.
-			if (ssNum.peek()=='*')
-				extractChar('*',ssNum);
-			extractChar('e',ssNum);
-			if (ssNum.peek()=='p')
-			{
-				extractChar('p',ssNum);
-				extractChar('s',ssNum);
-			}
-			if ( !ssNum.eof() && ssNum.peek()=='^')
-			{
-				extractChar('^',ssNum);
-				ssNum >> precision;
-			}
-			else
-			{
-				precision=1;  //epsExponent ist voraussichtlich 1
-			}
-
-		}
-		if (precision<=_epsPrecision)
-		{
-			//int number2=erg[precision];// get+set or addValue
-			erg.setValue(precision, ring1->getField()->ConvertScalar( number) );
-			//erg[precision]+=number;
-		
-		}
-	}
-	ssNum >> std::ws;
-	if (ssNum.fail() || !ssNum.eof())
-	{
-		std::cerr << "error during parseNumber, wrong format ?" << std::endl;
-		throw   "error during parseNumber, wrong format ?";
-	}
-	return erg;
-}
-
-
-/// monomgroup: monoms with dame degree, format (implicit) {coeff*x^deg*y^0,coeff*x^(deg-1)*y^0}. in Reality{coeff,coeff,...}
-inline int getMonomDegree(std::string monomGroup)
-{
-	int monomDegree=0;
-	for (size_t strPos=0;strPos<monomGroup.length();strPos++)
-	{
-		if (monomGroup[strPos]==',')
-			monomDegree++;
-	}
-	return monomDegree;
-}
-
-inline int getMaxMonomDegree( std::string polynomString)
-{
-	#ifdef DEBUG
-	std::cerr << "getMaxMonomDegree" << std::endl;
-	#endif
-
-	int MaxMonomDegree=0;
-
-	std::stringstream 	  polynomStream1;
-	polynomStream1 << polynomString;
-	polynomStream1 >> std::ws;
-	extractChar('{',polynomStream1);
-
-	#ifdef DEBUG
-		std::cerr << "polynomStream1" << polynomStream1.str() << std::endl;
-	#endif
-
-	while (!polynomStream1.eof() && polynomStream1.peek()=='{')
-	{
-		std::string monomGroup1=extractNextBracedData(polynomStream1);
-		polynomStream1 >>std::ws;
-		if ( polynomStream1.peek()!='}' )		
-			extractChar(',',polynomStream1);
-		polynomStream1 >>std::ws;
-		// get degree of monoms in this grout : is equal to number of elements decreased by 1.
-		int currMonomDegree=getMonomDegree(monomGroup1);
-		if (currMonomDegree>MaxMonomDegree)
-			(MaxMonomDegree=currMonomDegree);
-	}
-	#ifdef DEBUG
-	std::cerr << "getMaxMonomDegree : finished" << std::endl;
-	#endif
-	return MaxMonomDegree;
-}
-
-
-
-
-
-inline void eatWS(char* str,unsigned int & stelle)
-{
-	while (isspace(str[stelle])&&(stelle<strlen(str))) 
-	{
-		stelle++;
-	}
-}
-
-
-inline std::string ltrim(const std::string &str)
-{
-	std::string result="";
-	size_t pos=0;
-	for ( ; pos < str.length();pos++) 
-	{
-		if (!isspace(str[pos]))
-			break;
-	}
-
-	for (; pos < str.length();pos++) 
-	{
-		result=result+str[pos];
-	}
-	return result;
-}
-
-inline std::string rtrim(const std::string &str)
-{
-	std::string result="";
-	int pos=str.length()-1;
-	for ( ; pos > 0 ; pos--) 
-	{
-		if (!isspace(str[pos]))
-			break;
-	}
-
-	for (int pos2=0; pos2 <= pos ;pos2++) 
-	{
-		result=result+str[pos2];
-	}
-	return result;
-}
-
-
-inline std::string trim(const std::string &str)
-{
-	std::string res=ltrim(str);
-	return rtrim(res);
-}
-
-inline std::string eatWS(const std::string &str)
-{
-	std::string result="";
-	for (size_t pos=0; pos < str.length();pos++) 
-	{
-		if (!isspace(str[pos]))
-			result=result+str[pos];
-	}
-	return result;
-}
-
-//--------------------------Allgemeiner Parser Kram-----------------------------
-
-
-
-template <class _istream>
-char extractChar(char schar, _istream& sstream)
-{
-	char a;
-	sstream >> std::ws;
-	//#ifdef DEBUG
-		std::string sschara;
-		sschara+=schar;
-		std::string sa;
-		
-	//#endif
-	
-	if (sstream >> a)
-	{
-		
-		#ifdef DEBUG
-			sa+=a;
-			std::cerr << "extract char: dest '" << sschara << "' ;real '" << sa << "'" << std::endl;
-		#endif
- 		if ( a==schar)
-		{
-			return a;
-		}
-		else 
-		{
-			std::cerr <<"extract char: dest " << schar << " real "<< a << std::endl;
-		}
-	}
-	else 
-	{
-		if (sstream.eof())
-			std::cerr << "sstream.eof" <<  std::endl;
-		std::cerr << "failed read '" << sschara << "' !!!" <<  std::endl;
-	}
-
-	std::string error=std::string("extract char ") + schar + std::string("failed");
-	throw error;
-}
-
-template <class _istream>
-char extractChar(_istream& sstream,char schar)
-{
-	return extractChar(schar,sstream);
-}
-
-
-template <class _istream>
-int getSign(_istream& sstream)
-{
-	char a;
-	sstream >> std::ws;
-	if (!sstream.eof() )
-	{
-		a=sstream.peek();
-
-		if (a=='-')
-		{
-			sstream >>a;
-			return -1;
-		}
-		if (a=='+')
-		{
-			sstream >>a;
-		}
-	}
-	return 1;
-}
-
-
-
-
-template <class _istream>
-std::string stripComment(_istream& data, bool & isComment)
-{
-	char a;
-	std::stringstream scomment;
-	isComment=false;
-
-	assert(! data.fail() );
-	data >> std::ws;
-	assert(! data.fail() );
-
-	if ( !data.eof()  )
-	{
-		data >> a;
-		assert(! data.fail() );
-		if ( data.eof() )
-		{
-			data.clear();
-			//cerr << "putback1 " << a << endl;
-			data.putback(a);
-			isComment=false;
-			assert(! data.fail() );
-		}
-		else
-		{
-			assert(! data.eof() );
-			char b = data.peek();
-			if ( data.eof() )
-			{
-				data.clear();
-  				data.putback(a);
-				isComment=false;
-			}
-			else
-			{
-			//	cerr << "peek b :" << b << endl;
-				assert(! data.fail() );
-		
-				if (a=='-' && !data.eof() && b=='-')
-				{
-					data >> a;
-					isComment=true;
-					assert(! data.fail() );
-				}
-				else
-				{
-					assert(! data.eof() );
-					assert(! data.fail() );
-			//		cerr << "putback2 " << a << endl;
-					data.putback(a);
-					isComment=false;
-					assert(! data.fail() );
-				}
-			}
-		}
-	}
-	assert(! data.fail() );
-	while (!data.eof() && isComment)
-	{
-		data >> std::noskipws >> a;
-	//	std::cerr <<  a;
-		if ( a=='\n' || a =='\r')
-		{
-			break;
-		}
-		scomment << a;
-	//	cerr << "while scomment.str()" << scomment.str() << endl;
-	}
-	if ( data.fail() )
-	{
-		std::cerr  << " Failed strip comment.";
-		throw "Failed strip comment.";
-	}
-	//cerr << "scomment.str()" << scomment.str() << endl;
-	return scomment.str();
-}
-
-
-template <class _istream>
-void stripComments(_istream& data)
-{
-	bool wasComment=true;
-	while (wasComment)
-	{
-		stripComment(data, wasComment);
-	}
-	return;
-}
-
-
-template <class _istream>
-std::string readCurrentComment(_istream& data)
-{	bool wasComment;
-	return stripComment(data,wasComment);
-}
-
-
-template <class _istream>
-void seekToBraceLevel(_istream & inputData, int &currentLevel, int braceLevel)
-{
-	char a;
-	while (!inputData.eof() && currentLevel!=braceLevel)
-	{
-		inputData >> a;
-
-		if (!inputData.eof() && a=='-'  && inputData.peek()=='-')
-		{
-			inputData.putback(a);
-			
-			readCurrentComment(inputData);
-		}
-
-		if (a=='{')	currentLevel++;
-		
-		if (a=='}')	currentLevel--;
-
-		if (a==';')	throw "seekToBraceLevel: Unexpected End of Value";
-		
-		if (a=='=')	throw "seekToBraceLevel: Unexpected Assignment";
-
-		if (currentLevel==braceLevel)
-			break;
-	}
-	if (currentLevel!=braceLevel)
-		throw "seekToBraceLevel:failed seek to brace level";
-}
-
-/// @TODO Kommentieren !
-inline std::string extractNextData(std::stringstream &Data)
-{
-	char a;
-	std::stringstream result;
-
-	int braceLevel=0;
-
-	while (true )
-	{
-		#ifdef DEBUG
-			std::cerr << "stripComments:  " <<  result.str() << std::endl;
-		#endif 
-		stripComments(Data);
-		#ifdef DEBUG
-			std::cerr << "stripComments finished" <<  result.str() << std::endl;
-		#endif 
-
-		if (Data.eof())
-			throw "Unexpected eof in data";
-		if (  Data.peek()=='}' )
-		{
-			if  (braceLevel==0)
-				break;
-		}
-		if   ( Data.peek()==',' &&   braceLevel==0) 
-			break;
-		
-		Data   >> a;
-		result << a ;
-		if (a=='{')
-			braceLevel++;
-		if (a=='}')
-			braceLevel--;
-		
-		#ifdef DEBUG
-			std::cerr << "extractNextData: data.str()" <<  result.str() << std::endl;
-		#endif 
-	}
-	#ifdef DEBUG
-			std::cerr << "extractNextData finished!" <<  result.str() << std::endl;
-		#endif 
-	return result.str();
-}
-
-
-
-
-inline std::string 	extractNextBracedData(std::stringstream &Data)
-{
-	char a;
-	std::stringstream result;
-
-	extractChar('{',Data);
-	int braceLevel=1;
-
-	result << '{';
-	
-	while (true )
-	{
-		stripComments(Data);
-		if (Data.eof())
-			throw "Unexpected eof in curly braced data";
-		Data   >> a;
-		result << a ;
-
-		if (a=='}' && --braceLevel==0)
-			break;
-
-		if (a=='{')
-			braceLevel++;
-	}
-	return result.str();
-}
-
-
-
-
-/** @brief extracts a parametername,  from a input stream
- 
- \verbatim Grammatic: <name>=<value> ; <comment>
- <comment>={}\n | {--commentText}}n
- \endverbatim
-
-@todo : maybe  using an free parser generator is an optimal and higly portable solution instead of writing unreadable, complex, errneous and unflexible hardcoded parser
-*
-* todo : exclude further illegal chars - ',' etc.
-*/
-template <class _istream>
-std::string 	readParamName(_istream & inputData)
-{
-	char a;
-
-	std::stringstream parameterName;
-	bool beginCommentPossible=false;
-	bool containsWSPossible=false;
-
-	while (!inputData.eof() && !inputData.fail() )
-	{
-		a=inputData.peek();
-		if (a=='\n')
-		{
-			std::cerr << "ReadParamName: unexpected end of ParamName";
-			throw "ReadParamName: line break not allowed in parameter names";
-		}
-		if (a=='=')
-		{
-			break;
-		}
-		if (a==';')
-		{
-			std::cerr << "ReadParamName: unexpected End of ParamName";
-			throw "ReadParamName: unexpected End of ParamName";
-		}
-
-		if (isspace(a))
-		{
-			inputData >> std::ws;
- 			if ( parameterName.str().length()>0)
-			{
-				containsWSPossible=true;
-			}
-			continue;
-		}
-		if (a=='-')
-		{
-			if (!beginCommentPossible)
-		 		beginCommentPossible=true;
-			else
-			{
-				std::cerr << "ReadParamName: unexpected begin of a comment";
-				throw "ReadParamName: unexpected begin of a comment";
-			}
-		}
-		else
-		{
-			beginCommentPossible=false;
-		}
-	
-		if (containsWSPossible)
-		{
-			std::cerr << "ReadParamName: Parameter name contains white spaces";
-			throw "ReadParamName: Parameter name contains white spaces";
-		}
-		containsWSPossible = false;
-		inputData >> std::noskipws >> a;
-		parameterName << a;
-			
-	}
-	if (inputData.eof() || inputData.fail() )
-	{
-		std::cerr << "ReadParamName: unexpected end of data";
-		throw "ReadParamName: unexpected end of data";
-	}
-	return parameterName.str();
-}
-
-/// @todo eskaped anfuehrungszeichen werden von readStringValue nicht erkannt
-template <class _istream>
-std::string readStringValue(_istream & inputData, std::string paramName)
-{
-	std::stringstream 	parameterValue;
-	char a;
-	
-	a=inputData.peek();
-	assert (a=='\"');
-	
-	inputData >> a;
-	
-	parameterValue  <<  a;
-
-	while (!inputData.eof() && !inputData.fail() )
-	{
-		a=inputData.peek();
-		if (a=='\"')
-		{
-			inputData >> a;
-			parameterValue  <<  a;
-			return parameterValue.str();
-		}
-		inputData >> std::noskipws >> a;
-		parameterValue  <<  a;
-	}
-	throw "readStringValue: unexpected end of data";
-}
-
-/** @brief extracts a parameter value  from a input stream<br>
-
- Grammatic: <br>
-%<name%>=%<value%> ; %<comment%>
- %<comment%>={}\n | {--commentText}}n
-
-@todo : maybe  using an free parser generator is an optimal and higly portable solution instead of writing 
-unreadable, complex, errneous and unflexible hardcoded parser
-*
-*/
-template <class _istream>
-std::string readParamValue(_istream & inputData, std::string paramName)
-{
-	char a;
-
-	std::stringstream 	parameterValue;
-	bool 			beginCommentPossible = false;
-
-	std::string wsCache="";
-	
-	inputData >> std::ws;
-//	cerr << "readParamValue of " << paramName << endl;
-	while (!inputData.eof() && !inputData.fail() )
-	{
-
- 		//cerr << "parameterValue.str() " <<  parameterValue.str() << endl;
-		a=inputData.peek();
-		if (a=='\"')
-		{
-			return readStringValue( inputData, paramName);
-		}
-		if (a=='\n')
-		{
-			beginCommentPossible=false;
-			inputData >> std::noskipws >> a;
-			if (isspace(a))
-			{
-				wsCache+= a;
-			}
-			else
-			{
-				parameterValue  << wsCache; wsCache="";
-				parameterValue  <<  a;
-			}
-			continue;
-		}
-		if (a=='=')
-		{
-			std::string rest;
-			inputData >> rest;
-			//cerr << "current: " << parameterValue.str() ;
-			
-		//	cerr << "rest: " << rest ;
-			throw "ReadParamValue: unexpected assignment in parameter value";
-		}
-		if (a==';')
-			break;
-		if (a=='-')
-		{
-				bool wasComment=false;
-				stripComment(inputData,wasComment);
-				if (wasComment)
-					continue;
-		}
-		inputData >> std::noskipws >> a;
-		if (isspace(a))
-		{
-			wsCache+= a;
-		}
-		else
-		{
-			parameterValue  << wsCache; wsCache="";
-			parameterValue  <<  a;
-		}
-//		std::cerr << "parameterValue" << parameterValue.str() << endl;
-	}
-	if (inputData.eof() || inputData.fail() )
-		throw "readParamValue: unexpected end of data";
-	return parameterValue.str();
-}
-
-
-
-inline int countSubGroups(std::stringstream &polynomStream)
-{
-	std::string strCopy = polynomStream.str();
-
-	int braceLevel=0;
-	int subGroupCount=0;
-
-	for (size_t strPos=0;strPos<strCopy.length();strPos++)
-	{
-		if (strCopy[strPos]=='{')
-		{
-			if (braceLevel==1)
-				subGroupCount++;
-			braceLevel++;
-			
-		}
-		if (strCopy[strPos]=='}')
-		{
-			braceLevel--;
-			
-		}
-		if (braceLevel<0)
-			throw "countSubGroups: too much closing braces!";
-	}
-	if (braceLevel!=0)
-			throw "countSubGroups: Error in curly brace nesting";
-	return subGroupCount;
-}
-
-
-inline int countGroups(std::stringstream &polynomStream)
-{
-	std::string strCopy = polynomStream.str();
-
-	int braceLevel=0;
-	int groupCount=0;
-
-	for (size_t strPos=0; strPos<strCopy.length(); strPos++)
-	{
-		if (strCopy[strPos]=='{')
-		{
-			if (braceLevel==0)
-				groupCount++;
-			braceLevel++;
-			
-		}
-		if (strCopy[strPos]=='}')
-		{
-			braceLevel--;
-			
-		}
-		if (braceLevel<0)
-			throw "countSubGroups: too much closing braces!";
-	}
-	if (braceLevel!=0)
-			throw "groupCount: Error in curly brace nesting";
-	return groupCount;
-}
-
-
-inline int countElements(std::stringstream &str)
-{
-	std::string strCopy = str.str();
-
-	int braceLevel=0;
-	int elementCount=0;
-
-	for (size_t strPos=0;strPos<strCopy.length();strPos++)
-	{
-		if (strCopy[strPos]=='{')
-		{
-			braceLevel++;
-		}
-		if (strCopy[strPos]==',')
-		{
-			if (braceLevel==1)
-				elementCount++;
-		}
-		if (strCopy[strPos]=='}')
-		{
-			if (braceLevel==1)
-				elementCount++;
-			braceLevel--;
-		}
-		if (braceLevel<0)
-			throw "countSubGroups: too much closing braces!";
-	}
-	if (braceLevel!=0)
-			throw "countElements: Error in curly brace nesting";
-	return elementCount;
-}
-
-
-
-
diff --git a/sandbox/hurwitz.kroeker/src/polynom.cpp b/sandbox/hurwitz.kroeker/src/polynom.cpp
deleted file mode 100644
index 7797c6f..0000000
--- a/sandbox/hurwitz.kroeker/src/polynom.cpp
+++ /dev/null
@@ -1,734 +0,0 @@
-// polynom.cpp: Implementierung der Klasse polynom.
-//
-//////////////////////////////////////////////////////////////////////
-
-
-//////////////////////////////////////////////////////////////////////
-// Polynomxy
-//////////////////////////////////////////////////////////////////////
-template <class TNum, class TIndex>
-polynomXY<TNum, TIndex>::polynomXY( ) : 	maxDegree(-1),
-							maxDegreePlusOne( 0 ),
-							idefs(-1),
-							size( idefs.getSize() ),
-						koeff(NULL)
-{
-
-	name	= std::string("");
-   
-}
-
-
-
-/// create a polynom in (x,y). with maximal monom degree = <b>_maxDegree</b>
-template <class TNum, class TIndex>
-polynomXY<TNum, TIndex>::polynomXY(const short _maxDegree) : 	maxDegree(_maxDegree),
-							maxDegreePlusOne( _maxDegree + 1 ),
-							idefs( TIndex(_maxDegree)),
-							size(idefs.getSize() )
-									
-{
-	assert(_maxDegree>=0); // erstens das, und zweitens kann es theoretisch zum ueberlauf kommen, auch fuer maxDegreePlusOne
-
-	name	= std::string("");
-	koeff 	= new TNum[ idefs.getSize() ] ;
- 
-	for (short dim=idefs.getSize()-1; dim>=0; dim--)
-		koeff[dim] = TNum::Zero;
-}
-
-/// create a polynom in (x,y). with maximal monom degree= <b>_maxDegree</b>
-template <class TNum, class TIndex>
-polynomXY<TNum, TIndex>::polynomXY(string _name, const short _maxDegree) :	maxDegree(_maxDegree),
-													maxDegreePlusOne( _maxDegree+1 ),
-													idefs( TIndex(_maxDegree) ),
-													size(idefs.getSize() ),
-													name( _name)
-{
-	assert(_maxDegree>=0); // erstens das, und zweitens kann es theoretisch zum ueberlauf kommen
-	
-	koeff 	= new TNum[ idefs.getSize() ] ;
-
-	for (short dim = idefs.getSize()-1; dim >= 0 ; dim--)
-		koeff[dim] = TNum::Zero;
-}
-
-
-template <class TNum, class TIndex>
-polynomXY<TNum, TIndex>::polynomXY(const polynomXY<TNum, TIndex>& pxy) :	maxDegree(pxy.maxDegree),
-											maxDegreePlusOne(pxy.maxDegree+1),
-											idefs(pxy.idefs),
-											size( pxy.size ),
-											name(pxy.name)
-{								
-	koeff 	= new TNum[idefs.getSize() ] ;
-
-	for (short dim=idefs.getSize()  - 1 ; dim>=0; dim--)
-		koeff[dim] = pxy.koeff[dim];
-}
-
-
-
-template <class TNum, class TIndex>
-inline int polynomXY<TNum, TIndex>::getIndex(const short x_exp, const short y_exp) const
-{
-	return idefs.getPairIndex( x_exp, y_exp );
-}
-
-
-
-template <class TNum, class TIndex>
-inline TNum const * 	polynomXY<TNum, TIndex>::getCoeffConstAddr(const short x_exp, const short y_exp) const
-{
-	#ifdef SAFE
-		testBounds(x_exp, y_exp);
-	#endif
-	return &koeff[ getIndex(x_exp, y_exp) ];
-}
-
-template <class TNum, class TIndex>
-inline TNum * 		polynomXY<TNum, TIndex>::getCoeffAddr(const short x_exp, const short y_exp)
-{
-	#ifdef SAFE
-		testBounds(x_exp, y_exp);
-	#endif
-	return &koeff[ getIndex(x_exp, y_exp) ];
-}
-
-
-/// reset max possible degree of a contained (x,y)-monom. All data is erased !
-template <class TNum, class TIndex>
-void polynomXY<TNum, TIndex>::setDegree(const short _maxDegree)
-{
-	assert(_maxDegree>=0); // erstens das, und zweitens kann es theoretisch zum ueberlauf kommen
-
-	#ifdef DEBUG
-		std::cerr << "polynomXY<TNum>::setDegree"  << std::endl;
-		std::cerr << "setDegree"  << std::endl;
-		std::cerr << "_maxDegree" << _maxDegree << std::endl;
-	#endif
-
-	delete[] koeff;
-
-	maxDegree	 = _maxDegree;
-	maxDegreePlusOne = _maxDegree+1;
-	idefs=TIndex(_maxDegree);
-
-	size  = idefs.getSize() ;
-
-	koeff = new TNum[idefs.getSize() ] ;
-
-	for (short dim=idefs.getSize() -1; dim>=0; dim--)
-		koeff[dim]=TNum::Zero;
-
-}
-
-
-template <class TNum, class TIndex>
-short polynomXY<TNum, TIndex>::getMaxDegree() const
-{
-	return maxDegree;
-}
-
-template <class TNum, class TIndex>
-bool polynomXY<TNum, TIndex>::operator==(const polynomXY<TNum, TIndex>& pxy) const
-{
-
-	assert(&pxy!=NULL);
-	for (short currDegree=0; currDegree <= maxDegree; currDegree++)
-		for(short yexp=0; yexp <= currDegree; yexp++)
-			if (  getCoeff( currDegree-yexp, yexp) != pxy.getCoeff( currDegree-yexp, yexp) )
-				return false;
-	return true;
-	 
-}
-
-template <class TNum, class TIndex>
-polynomXY<TNum, TIndex>& polynomXY<TNum, TIndex>::operator=(const polynomXY<TNum, TIndex>& pxy)
-{
-	if ( this!=&pxy )
-	{
-
-		assert(&pxy!=NULL);
-
-		maxDegree	 = pxy.maxDegree;
-		maxDegreePlusOne = pxy.maxDegreePlusOne;
-
-		idefs=pxy.idefs;
-		size = pxy.size;
-		
-		if (koeff!=NULL) delete[] koeff;
-
-		koeff = new TNum[idefs.getSize() ] ;
-
-		for (short dim = idefs.getSize()  - 1; dim >= 0; dim--)
-			koeff[dim] = pxy.koeff[dim];
-	}
-	return *this;
-}
-
-
-template <class TNum, class TIndex>
-polynomXY<TNum, TIndex>::~polynomXY()
-{
-	if (koeff!=NULL)
-		delete[] koeff;
-	koeff = NULL;
-}
-
-
-
-template <class TNum, class TIndex>
-void polynomXY<TNum, TIndex>::output(std::ostream& os) const
-{
-	int i, j;
-	TNum 	z;
-
-	for (i=0; i<=maxDegree; i++)
-		for(j=0; j<=i; j++)
-		{
-			z = getCoeff( i-j, j); 
-			if (! z.isZero())
-				os << "(" << z <<")" << "x^" << i-j << "y^" << j << " + ";
-		}
-}
-
-
-
-/// output polynom in Macaulay-Style 
-template <class TNum, class TIndex>
-void polynomXY<TNum, TIndex>::print(std::ostream& os) const
-{
-	int i, j;
-
-	TNum 	z;
-
-	bool first = true;
-
-	for (i=0; i<=maxDegree; i++)
-		for( j=0; j<=i; j++)
-		{
-			z = getCoeff(i-j, j); 
-			if ( z.isNotZero() )
-			{
-				
-				if (first)
-					first=false;
-				else
-				{
-					os << " + ";
-				}
-				 
-				os << "(" << z << ")*x^" << i-j << "*y^" << j ;
-			}
-		}
-	//os << ";\n  ";
-}
-
-
-template <class TNum, class TIndex>
-void polynomXY<TNum, TIndex>::printInMacaulayStyle(std::ostream& os) const
-{
-	 os << name << "=" ;
-	print(os);
-	 os <<  ";" ;
-}
-
-
-/// print object ( debug)
-template <class TNum,class TIndex>
-void polynomXY<TNum, TIndex>::outputMatrix() const
-{
-	int i, j;
-
-	TNum 	z;
-
-	std::cerr << std::endl <<"Name: " << name  << " degree: " << maxDegree << std::endl << "-----------------" << std::endl;
-	for (i=0; i<=maxDegree; i++)
-	{
-		std::cerr << "i" << i << " ";
-		for(j=0; j<=i; j++)
-		{
-			z =getCoeff(i-j, j); 
-			if ( z.isNotZero() )
-				std::cerr << z << "*x^" << i-j << "*y^" << j << " + " ; 
-		}
-		std::cerr << std::endl;
-	}
-}
-
-/** @brief output coefficients in monomgroups with equal degree  
-*/
-template <class TNum, class TIndex>
-void polynomXY<TNum, TIndex>::OutputPureCoefficients(ostream &OStream, int monomDegree, bool mitKomma) const
-{
-	int j;
-
-	TNum	 z;
-
-	OStream << "{";
-	for(j=0; j<=monomDegree; j++)
-		{
-			z = getCoeff(monomDegree-j, j); 
-			OStream << z << " ";
-			if (j<monomDegree)
-				OStream << ", ";
-		}
-
-	OStream << "} ";
-	if ( mitKomma==true )
-		 (OStream) << ", ";
-
-	OStream << "	-- ";
-
-	for(j=0; j<=monomDegree; j++)
-	{
-		z =getCoeff(monomDegree-j, j); 
-
-		OStream << "(" << z <<")*x^" << monomDegree-j << "y^" << j;
-		if (j<monomDegree)
-			OStream << " + ";
-	}
-
-
-	OStream << std::endl;
-}
-
-
-/// Test, if x_exp and y_exp have legal values due do maxDegree !
-template <class TNum, class TIndex>
-inline void polynomXY<TNum, TIndex>::testBounds(const short x_exp,const short y_exp) const
-{
-	if ( !( getIndex(x_exp, y_exp)>=0) )
-	{
-		std::cerr <<"polynomXY::setCoeff() : Err!" << std::endl;
-	}
-	if ( !( (getIndex(x_exp, y_exp)) < ( maxDegreePlusOne*maxDegreePlusOne )) )
-	{
-		std::cerr <<"polynomXY::setCoeff() : Err!" << std::endl;
-		std::cerr << "(x_exp*(maxDegree+1)+y_exp)=" << (x_exp*(maxDegreePlusOne)+y_exp) << std::endl;
-		std::cerr << "(maxDegree+1)*(maxDegree+1)=" << (maxDegreePlusOne)*(maxDegreePlusOne);
-	}
-	assert( (x_exp + y_exp) <=maxDegree);
-	assert( x_exp>=0 && y_exp>=0);
-}
-
-
-template <class TNum, class TIndex>
-inline void polynomXY<TNum, TIndex>::setCoeff(const short x_exp,const short y_exp, const TNum value)
-{
-	#ifdef SAFE
-		testBounds(x_exp,y_exp);
-	#endif
-
-	koeff[ getIndex(x_exp, y_exp) ] = value;
-};
-
-
-template <class TNum, class TIndex>
-inline TNum polynomXY<TNum, TIndex>::getCoeff(const short x_exp, const short y_exp) const
-{
-	#ifdef SAFE
-		testBounds(x_exp,y_exp);
-	#endif
-	return koeff[ getIndex(x_exp, y_exp) ];
-}
-
-
-template <class TNum, class TIndex>
-inline TNum const polynomXY<TNum, TIndex>::getCoeffConst(const short x_exp,const short y_exp) const
-{
-	#ifdef SAFE
-		testBounds(x_exp,y_exp);
-	#endif
-	return koeff[ getIndex(x_exp, y_exp) ];
-}
-
-template <class TNum, class TIndex>
-inline const TNum & polynomXY<TNum, TIndex>::getCoeffConstRef(const int x_exp,const int y_exp) const
-{
-	#ifdef SAFE
-		testBounds(x_exp,y_exp);
-	#endif
-	return koeff[ getIndex(x_exp, y_exp) ];
-}
-
-
-template <class TNum, class TIndex>
-inline TNum& polynomXY<TNum, TIndex>::getCoeffRef(const short x_exp, const short y_exp)
-{
-	#ifdef SAFE
-		testBounds(x_exp,y_exp);
-	#endif
-	return koeff[ getIndex(x_exp, y_exp) ];
-}
-
-
-template <class TNum, class TIndex>
-inline  short polynomXY<TNum, TIndex>::getDegree() const
-{
-	return maxDegree;
-};
-
-template <class TNum, class TIndex>
-inline void polynomXY<TNum, TIndex>::clear(short _grad)
-{
-	#ifdef SAFE
-	assert (_grad<=maxDegree);
-	#endif 
-	for (int i=0; i<= _grad; i++)
-		for(int j=0; j<=i; j++)
-			koeff[ getIndex( i-j, j ) ] = TNum::Zero;
-
-
-}
-
-template <class TNum, class TIndex>
-inline void polynomXY<TNum, TIndex>::clear()
-{
-	for (int dim=0; dim<idefs.getSize() ; dim++)
-	{
-		koeff[dim] = TNum::Zero;
-	} 
-}
-
-
-  
-
-///////////////////////////////////////////////////////////////////
-// polynomx
-///////////////////////////////////////////////////////////////////
- 
-template <class TNum>
-const polynomx<TNum>   polynomx<TNum>::Zero ( polynomx<TNum>::getZero() );
-
-template <class TNum>
-const polynomx<TNum>   polynomx<TNum>::One ( polynomx<TNum>::getOne() );
-
-
-template <class TNum>
-polynomx<TNum >::polynomx():    maxDegree(-1), size(0)
-{
-	 
-	koeff = NULL ;
-}
-
-
-template <class TNum>
-polynomx<TNum >::polynomx(const int gr):    maxDegree(gr), size(gr+1)
-{
-	assert(gr>=0); // erstens das, und zweitens kann es theoretisch zum ueberlauf kommen
-
-	koeff = new TNum[size] ;
-	for (int dim=size-1; dim>=0; dim--)
-		koeff[dim] = TNum::Zero;
-}
-
-
-
-template <class TNum>
-polynomx< TNum >::polynomx(const polynomx<TNum> & fpx) : maxDegree(fpx.maxDegree),  size(fpx.maxDegree + 1 )
-{
-	koeff = new TNum[size] ;
-	for (int dim=size-1; dim>=0; dim--)
-		koeff[dim] = fpx.koeff[dim];
-}
-
-
-template <class TNum>
-polynomx< TNum >::polynomx(const vector<TNum> & vecx) : maxDegree( vecx.size()-1 ),  size( vecx.size()  )
-{
-	koeff = new TNum[size] ;
-	for (int dim=size-1; dim>=0; dim--)
-		koeff[dim] = vecx[dim];
-}
-
-
-		
-template <class TNum>
-inline polynomx<TNum> & polynomx< TNum >::operator=(const polynomx<TNum> & fpx)
-{
-	if ( this != &fpx )
-	{
-		assert(&fpx!=NULL);
-		//assert(maxDegree	 == fpx.maxDegree)
-		maxDegree	 = fpx.maxDegree;
-		size = fpx.size;
-		
-		if (koeff!=NULL) 
-			delete[] koeff;
-
-		koeff = new TNum[size] ;
-
-		for (short dim=size-1; dim>=0; dim--)
-			koeff[dim] = fpx.koeff[dim];
-	}
-	return *this;
-
-}
-
-
-template <class TNum>
-inline void 	polynomx<TNum >::testbounds(const int x_exp) const
-{
-	if (x_exp<0 || x_exp>=maxDegree+1)
-	{
-			std::cerr <<"polynomx::getCoeff(): Err";
-			std::cerr << "x_exp =" << x_exp;
-			std::cerr << "maxDegree+1= " << maxDegree+1;
-			std::cerr << fflush;
-	}
-	assert( x_exp <= maxDegree );
-	assert( x_exp >= 0 );
-}
-
- 
-
-template <class TNum>
-inline TNum 	polynomx<TNum >::getCoeff(const int x_exp)  const
-{
-	#ifdef SAFE
-		testbounds(x_exp);
-	#endif
-
-	return koeff[x_exp];
-}
-
-
-
-template <class TNum>
-inline const TNum& 	polynomx<TNum >::getCoeffConstRef(const int x_exp)  const
-{	
-	#ifdef SAFE
-		testbounds(x_exp);
-	#endif
-
-	return koeff[x_exp];
-}
-
-
-template <class TNum>
-inline  TNum& 	polynomx<TNum >::getCoeffRef(const int x_exp)  
-{	
-	#ifdef SAFE
-		testbounds(x_exp);
-	#endif
-
-	return koeff[x_exp];
-}
-
-
-template <class TNum>
-inline  TNum const polynomx<TNum >::getCoeffConst(const int x_exp)  const
-{	
-	#ifdef SAFE
-		testbounds(x_exp);
-	#endif
-
-
-
-	return koeff[x_exp];
-}
-
-template <class TNum>
-inline  TNum polynomx<TNum >::getSafeCoeff(const int x_exp)  const
-{	
-	#ifdef SAFE
-		testbounds(x_exp);
-	#endif
-	if (x_exp>maxDegree)
-		return TNum::Zero;
-
-	return koeff[x_exp];
-}
-
-template <class TNum>
-inline  TNum const polynomx<TNum >::getSafeCoeffConst(const int x_exp)  const
-{	
-	#ifdef SAFE
-		//testbounds(x_exp);
-	#endif
-	if (x_exp>maxDegree)
-		return TNum::Zero;
-
-
-	return koeff[x_exp];
-}
-
-
-template <class TNum>
-inline void 	polynomx<TNum >::setCoeff(const int x_exp, const TNum& value)
-{
-	#ifdef SAFE
-		testbounds(x_exp);
-	#endif
-
-	koeff[x_exp] = value;
-
-}
-
-
-template <class TNum>
-inline const int 	polynomx<TNum >::getDegree() const 
-{
-	return(maxDegree);
-
-};
-
-template <class TNum>
-inline const int 	polynomx<TNum >::getExactDegree() const 
-{
-	//return(maxDegree);
-
-	for (int deg= maxDegree; deg>=0; deg--)
-		if (koeff[deg] != TNum::Zero)
-			return deg;
-
-	return 0;
-};
-
-
-
-template <class TNum>
-inline const bool 	polynomx<TNum >::isConstant() const 
-{
-	//return(maxDegree);
-
-	for (int deg= maxDegree; deg>0; deg--)
-		if (koeff[deg] != TNum::Zero)
-			return false;
-
-	return true;
-};
-
-
-template <class TNum>
-inline const bool 	polynomx<TNum >::isZero() const 
-{
-	for (int x_exp= maxDegree; x_exp>=0; x_exp--)
-		if (koeff[x_exp] != TNum::Zero)
-			return false;
-
-	return true;
-
-};
-
-
-template <class TNum>
-bool polynomx<TNum>::operator==(const polynomx<TNum>& px) const
-{
-	assert(&px!=NULL);
-	for (short currDegree=0; currDegree <= maxDegree; currDegree++)
-		if (  getCoeff( currDegree ) != px.getCoeff( currDegree) )
-				return false;
-	return true;
-	 
-}
-
-template <class TNum>
-bool polynomx<TNum>::operator!=(const polynomx<TNum>& px) const
-{
-	assert(&px!=NULL);
-	for (short currDegree=0; currDegree <= maxDegree; currDegree++)
-		if (  getCoeff( currDegree ) != px.getCoeff( currDegree) )
-				return true;
-	return false;
-	 
-}
-
-template <class TNum>
-inline const bool 	polynomx<TNum >::isOne() const 
-{
-	for (int x_exp= maxDegree; x_exp>0; x_exp--)
-		if (koeff[x_exp] != TNum::Zero)
-			return false;
-
-	return  (koeff[0] == TNum::One);
-
-};
-
-
-
-
-template <class TNum>
-polynomx<TNum >::~polynomx()
-{
-	delete[] koeff;
-}
-
-
-template <class TNum>
-void polynomx<TNum >::clear(int _grad)
-{
-	for (int dim=0; ( dim<size && dim<=_grad) ; dim++)
-		koeff[dim] = TNum::Zero;
-}
-
-
-
-template <class TNum>
-void polynomx<TNum >::clear()
-{
-	for (int dim=0; dim<size ; dim++)
-		koeff[dim] = TNum::Zero;
-}
-
-template <class TNum>
-std::string polynomx<TNum>::getStringRep() const
-{
-    int i;
-
-    TNum    z;
-
-    bool first = true;
-
-    std::stringstream strstream;
-
-    for (i=0; i<=maxDegree; i++)
-    {
-         
-        z = getCoeff(i); 
-        if ( z.isNotZero() )
-        {
-            if (first)
-                first=false;
-            else
-            {
-                strstream << " + ";
-            }
-                
-            strstream << "(" << z << ")*x^" << i ;
-        }
-    }
-    return strstream.str();
-    //os << ";\n  ";
-}
-/// output polynom in Macaulay-Style 
-template <class TNum>
-void polynomx<TNum>::print(std::ostream& os) const
-{
-	int i;
-
-	TNum 	z;
-
-	bool first = true;
-
-	for (i=0; i<=maxDegree; i++)
-	{
-		 
-		z = getCoeff(i); 
-		if ( z.isNotZero() )
-		{
-			if (first)
-				first=false;
-			else
-			{
-				os << " + ";
-			}
-				
-			os << "(" << z << ")*x^" << i ;
-		}
-	}
-		
-	//os << ";\n  ";
-}
diff --git a/sandbox/hurwitz.kroeker/src/polynom.h b/sandbox/hurwitz.kroeker/src/polynom.h
deleted file mode 100644
index 9718a4b..0000000
--- a/sandbox/hurwitz.kroeker/src/polynom.h
+++ /dev/null
@@ -1,395 +0,0 @@
-
-#ifndef POLYNOM_H4D45E74F99FC
-#define POLYNOM_H4D45E74F99FC
-
-#if _MSC_VER > 1000
-#pragma once
-#endif // _MSC_VER > 1000
-
-
-#include <fstream>
-#include <iostream>
-#include <assert.h>
-
-#include <stdlib.h>
-#include <iostream>
-#include <sstream>
-#include <string>
-#include <vector>
-
-
-
-/** \file polynom.h
-*
-* @brief contains polynomial classes in one and two varibles with template coefficients
-*/
-
-//using namespace std;
-using  std::cout;
-using  std::cerr;
-using  std::endl;
-using  std::string;
-using  std::vector;
-using  std::ostream;
-using  std::stringstream;
-
-#include "parseTools.h"
-
-template <class PolynomXY_Type, class RingType, class _istream>
-PolynomXY_Type  createFromStream (_istream & _polynomStream, RingType & ringRef )
-{
-
-	
-//	std::cerr << "_polynomStream: "<<  _polynomStream.str() << std::endl;
-
-	std::string 		polynomStr = extractNextBracedData( _polynomStream );
-
-	std::stringstream  	polynomStream( polynomStr);
-
-	int 				mononGroupNum = countSubGroups( polynomStream );
-
-	//std::cerr << "momonroups: "<<  mononGroupNum << std::endl;
-
-	
-	int 	MaxMonomDegree = getMaxMonomDegree( polynomStr );
-	vector<int> degreeTracking(MaxMonomDegree + 1);
-	
-	PolynomXY_Type res(MaxMonomDegree);
-	
-	
-	polynomStream.clear();
-	polynomStream.seekg(0);
-	
-	extractChar(polynomStream, '{');
-	//std::cerr << "matrixStream" << matrixStream.str() << std::endl;
-
-	for ( int currMonomGroupNum = 1;  currMonomGroupNum <= mononGroupNum ;  currMonomGroupNum ++ )
-	{
-		std::string  monomGroup   = extractNextBracedData(polynomStream);
-		std::stringstream ssMonomGroup(monomGroup);
-
-		int currDegree = countElements(ssMonomGroup) -1;
-		//std::cerr << "currDegree" << currDegree << std::endl;	
-		ssMonomGroup.clear();
-		ssMonomGroup.seekg(0);
-		//safety:
-		assert(degreeTracking[currDegree] == 0);
-		degreeTracking[currDegree]  = 1 ;
-
-		//std::cerr << "monomGroup" << monomGroup << std::endl;	
-			
-		extractChar(ssMonomGroup, '{');
-
-		for ( int y_exp=0;  y_exp <= currDegree ;  y_exp++)
-		{
-			// extract next unbraced Element on current brace Level (finished by ',' or '}')
-			string nextElement=extractNextData(ssMonomGroup);
-
-		//	std::cerr << "nextElement" << nextElement << std::endl;	
-
-			typename PolynomXY_Type::CoefficientType  coeff = parseNumber( &ringRef, nextElement.c_str(), ringRef.getEpsPrecision() );
-		
-			res.setCoeff( currDegree - y_exp, y_exp, coeff );
-
-			if (y_exp !=currDegree ) 
-				extractChar( ssMonomGroup, ',' );
-			else extractChar( ssMonomGroup, '}' );
-		}
-		if (currMonomGroupNum !=mononGroupNum ) 
-				extractChar( polynomStream, ',' );
-		else extractChar( polynomStream, '}' );
-	}
-	//std::cerr << "polynom initialization OK" << std::endl;
-	return res;
-}
-
-template <class PolynomXY_Type, class RingType>
-PolynomXY_Type  createFromString (string & _polynomString, RingType & ringRef )
-{
-	stringstream strstream   (   _polynomString);
-	return createFromStream<PolynomXY_Type>( strstream, ringRef);
-}
-
-/** @brief class used to store the coefficients of a polynom in (x,y)
-*
-* @TODO eventuell auch einen Ring hier speichern, da im Programm nicht allzuviele Polynome verwendet werden.
-* @TODO soweit Verallgemeinern, dass die Klasse mit einer getIndex-Fkt parametrisiert werden kann. Dann kannste fast_polynom wegwerfen.
-*/
-template <class TNum, class TIndex>
-class polynomXY  
-{
-private:
-	 short 	maxDegree; ///< max possible degree of a contained (x,y)-monom
-	 short 	maxDegreePlusOne;
-	TIndex   idefs;
-	 short 	size; 	///< monom coefficients count 
-	TNum *	koeff;	///<koeff[x_exp*(maxDegree+1)+y_exp] = value;
-
-	//TNum * *	offsets;
-	string 	name;	/// object name
-	
-
-public:
-
-	typedef TNum 	CoefficientType;
-
-	/** @name Contsructors / Destructors
-	 @{ */
-		polynomXY();
-		polynomXY(const short _maxDegree);
-	
-		polynomXY(string _name, const short _maxDegree);
-	
-		/// copy constructor
-		polynomXY(const polynomXY&);
-
-		~polynomXY();
- 	/** @} */
-
-
-	/** @name Initialization
-	 @{ */
-		inline void 	setDegree(short maxDegree);
-
-		inline void 	clear(short maxDegree);
-		inline void 	clear();
-	/** @} */
-
-
-	/** @name Data access
-	 @{ */
-		inline void 		setCoeff(const short x_exp,const short y_exp, const TNum value);
-	
-		inline TNum 		getCoeff(const short x_exp,const short y_exp) 	const;
-	
-		inline TNum const 	getCoeffConst(const short x_exp,const short y_exp) const;
-	
-		inline const TNum &  	getCoeffConstRef(const int x_exp,const int y_exp) const;
-	
-		inline TNum& 		getCoeffRef(const short x_exp, const short y_exp);
-
-		inline TNum const * 	getCoeffConstAddr(const short x_exp, const short y_exp) const;
-		inline TNum * 		getCoeffAddr(const short x_exp, const short y_exp);
-	/** @} */
-
-
-	/** @name Properties
-	 @{ */
-		inline  short 	getDegree() const;
-		
-		inline string 	getName() const {	return name;	};
-
-		/// return max monom degree capacity
-		inline short 	getMaxDegree() const;
-	/** @} */
-
-	
-
-
-	/** @name Safety
-	 @{ */
-		inline void testBounds(const short x_exp, const short y_exp) const;
-	/** @} */
-	
-	/** @name operators
-	 @{ */
-		/// assignment operator
-		polynomXY& operator=(const polynomXY&);
-		bool operator==(const polynomXY&) const;
-	/** @} */
-	//void update(std::string s);
-	//void update(std::string s);
-
-	/** @name IO
-	 @{ */
-		void OutputPureCoefficients( ostream &datei, int maxDegree, bool mitKomma) const;
-		void output( std::ostream& os) const;
-		void printInMacaulayStyle( std::ostream& os) const;
-		void outputMatrix() const;
-		void print( std::ostream& os) const;
-	/** @} */
-	private:
-		inline int  getIndex(const short x_exp, const short y_exp) const;
-
-};
-
-
-
-
-
-/** \class polynomx
-*
-* @brief represents a polynom in one variable
-*
-*
-*
-
-*
-*/
-template <class TNum>
-class polynomx
-{
-
-    public:
-        static const polynomx   One;
-        static const polynomx   Zero;
-
-	private:
-		 int 	maxDegree;
-		 int 	size;
-		TNum *		koeff; ///< data; koeff[x_exp] = value;
-
-        
-	protected:
-		/** @name Safety
-		@{ */
-			inline void 		testbounds(const int x_exp) const;
-		/** @} */
-	public:
-	
-		typedef TNum 	CoefficientType;
-
-
-        std::string     getVariableName() const  {   return "x"; };
-
-        std::string      getStringRep() const;
-
-		/** @name Constructors / Destructors
-		@{ */
-			polynomx();
-			polynomx(const int gr);
-
-            polynomx(const int gr, bool monic);
-			inline  polynomx(const polynomx & fpx);
-			inline  polynomx(const std::vector<TNum> & vecx);
-
-			virtual ~polynomx();
-
-		/** @} */
-
-			inline polynomx & operator=(const polynomx & fpx);
-
-			inline bool  operator==(const polynomx & fpx) const;
-			inline bool  operator!=(const polynomx & fpx) const;
-
-            inline const TNum  & operator[](const int x_exp) const
-            {
-                assert ( x_exp>=0 && x_exp <= maxDegree );
-                return koeff[ x_exp ];
-            }
-
-	
-		/** @name init
-		@{ */
-			void 	clear(int _degree);
-			void 	clear();
-		/** @} */
-		
-
-		/** @name Data access
-		@{ */
-                
-			inline TNum 		getCoeff(const int x_exp)  const;	
-
-			inline TNum 		getSafeCoeff(const int x_exp)  const;
-		
-			inline  TNum& 		getCoeffRef(const int x_exp) ;
-
-			inline  const TNum& 	getCoeffConstRef(const int x_exp) const;
-
-			inline  TNum const 	getCoeffConst(const int x_exp)  const;
-
-			inline  TNum const 	getSafeCoeffConst(const int x_exp)  const;
-		
-			inline void 		setCoeff(const int x_exp, const TNum& value);
-	
-		/** @} */
-
-
-		/** @name Properties
-		 @{ */
-			inline const int 	getDegree() const ;
-            inline const int    getInitialDegree() const { return getDegree() ; }
-			inline const int 	getExactDegree() const ;
-
-			inline const bool isZero() const ;
-
-			inline const bool isOne() const ;
-
-			inline const bool isConstant() const ;
-
-            // das problem lag in der include-reihenfolge  !!! warum ist inline gefährlich??
-            static polynomx<TNum>  getOne()   
-            {
-                #ifdef DEBUG
-                std::cerr << "polynomx<TNum>  getOne()  " << std::endl;
-                #endif
-                polynomx pol= polynomx(0);
-                // manchmal nicht korrekt 
-                pol.setCoeff(0, polynomx<TNum>::CoefficientType::One);
-                assert(1 == pol.getCoeff(0).getX() );
-
-                return pol;
-            }
-
-            static polynomx<TNum>  getZero()   
-            {
-                polynomx pol= polynomx(0);
-                
-                pol.setCoeff(0,TNum::Zero);
-            
-                return pol;
-            }
-
-		/** @} */
-
-		void print( std::ostream& os) const;
-		
-	
-       template <class TCoeffRing>
-       inline bool nextInPlace(const TCoeffRing& coeffRing,  bool ignoreHighestCoeff=false )  
-        {
-
-            polynomx *   result = this;
-            
-            TNum   currCoeff = TNum::Zero;
-            int degree = getInitialDegree();
-            if ( ignoreHighestCoeff )
-                degree--;
-            
-            int pos=0;
-            while (currCoeff==TNum::Zero && pos<=degree)
-            {                
-                coeffRing.addInPlace( getCoeffRef(pos), TNum::One );
-                currCoeff = getCoeff( pos );
-                pos++;
-            };
-            if (pos>degree && currCoeff==TNum::Zero)
-                return false;
-            return true;           
-        }
-	
-
-};
-
-
-
-template <typename TNum, typename TIndex>
-std::ostream &  operator<<(std::ostream & out, const polynomXY<TNum, TIndex>& z)  
-{	
-	z.print(out);
-	return out;
-}
-
-
-template <typename TNum>
-std::ostream &  operator<<(std::ostream & out, const polynomx<TNum>& z)  
-{	
-	z.print(out);
-	return out;
-}
-
-
-#include "polynom.cpp"
-
-#endif // ifndef POLYNOM_H4D45E74F99FC
diff --git a/sandbox/hurwitz.kroeker/src/polynomdefs.h b/sandbox/hurwitz.kroeker/src/polynomdefs.h
deleted file mode 100644
index 941fd0a..0000000
--- a/sandbox/hurwitz.kroeker/src/polynomdefs.h
+++ /dev/null
@@ -1,388 +0,0 @@
-
-
-#pragma once
-
-#include "CompileFunctions.h"
-
-#include <assert.h>
-
-enum P_or_QPolynom
-    {
-      PCoefficient,
-      QCoefficient,
-};
-
-
-// siehe zum besseren Verstaendnis "Aspektorientierte Programmierung in C++: Teil 2, Multiple Aussichten"
-// http://www.heise.de/ix/artikel/2001/09/142/09.shtml
-// Traits heisst uebrigens Charakterzuege
-// see also http://www.oonumerics.org/tmpw00/
-// http://www.it.neclab.eu/~berti/generic/
-
-/** 
-@brief contains template parameter definition for fast_polynomXY (Traits), 
-*     parametrized by characteristic(field) during compile time. The design was more try and error than
-*     applying common metaprogramming concepts, but this schould be the right way
-*
-*
-* @description
-*
-* der Aufbau ist wie folgt: 
-* polynomdefs definiert (zur Kompilezeit) beispielsweise den inneren Datenaufbau von improved_polynom (polynom in zwei Variablen)
-*<br>
-* Erreichte Optimierung
-* Durch die Shift-Operation in getPairIndex wird der Zugriff
-* auf eine Polynomkoeffizient <br>
-* (k*(x^a)*(y^b), a und b \in{0..DEGREE} )  <br>
-* beschleunigt.
-* <br>
-* Nachteil: ist DEGREE keine Zweierpotenz, so muss für die Polynomkoeffizienten
-* ein unnoetig groesseres Array definiert werden, in welchem nicht alle Eintraege belegt sind. 
-* Dies führt wieder zu vermehrten Cache Misses
-*
-* improved_polynom haengt aber auch vom Datentyp des Polynomkoeffizienten ab, ich weiss
-* momentan nur nicht, wie ich den Dateintyp als typedef-Variable in polynomdefs
-* festlege
-*
-* ein Problem ist der dynamische Aspekt: wie 
-* kann man 'improved_polynom' auch mit einem Objekt und nicht mit statischen 
-* Daten initialiesieren?
-*
-* @param DEGREE ist der maximal verwendete Grad des Polynoms (in zwei Variablen.)
-*
-* @todo: Ueberpruefung auf DEGREE kleiner 128, wegen 	"static const short pshift" - wieso, DAS ist kein Problem, aber eine wellDefined-Funktion sollte programmiert werden.
-*/
-/// @todo Vorsicht beim Schiften! muss ich beim Shift die Variablen vorher in ein int konvertieren ja/nein?
-/// @todo Korrektheit: Polynomdefs alle falsch, nur durch die Tatsache, dass nextpow2num(3)=4 ist (hoffentlich), passen die Größen doch und es gibt keine
-///   Speicherschutzverletzung
-//polynomdefs und MAtrixDefs sind genau gleich -> Eine der Definitionen koennte wegfallen!
-template <int DEGREE>
-class polynomdefs
-{
-	///due to compile problems with some compilers enums are used instead of regular member variables
-private:
-	enum { 
-		pshift_m = needbits<DEGREE>::value
-	};
-public:
-	enum {	/// maximal zulaessige Grad eines Polynommonoms mit der Einstellung DEGREE
-		maxdegree_m	= nextpow2num<DEGREE>::value - 1
-	};
-	int getSize()  const { return size_m; }
-	enum {/// Anzahl bytes, die von einem arrayindex der Polynomkoeffizientenliste belegt werden
-		/// @todo wieso nicht (DEGREE <<needbits<DEGREE>::value |degree) +1 ? nextpow2num ist aber nicht falsch (nur zu viel) und belegt eine gerade Anzahl von Plätzen.
-		size_m		= (nextpow2num<DEGREE>::value)*(nextpow2num<DEGREE>::value)
-	};
-	inline  static bool wellDefined()
-	{
-		return (DEGREE<128);
-	};
-	/// compute a*(2^pshift)+b
-	inline  static short getPairIndex(const short a, const short b) 
-	{
-		#ifdef COUNT
-			bitwiseShift	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		
-		//return (((int)a<<pshift)|(int)b);
-		return ( ((int)a<<needbits<DEGREE>::value) | (int)b );
-	}
-};
-
-/// @brief polynomdefsNoShift: bei dieser Datenstruktur liegen die Polynomkoeffizienten noch nicht hintereinander.
-/// @note es ging bei dieser Definition um den Test, ob die Schiftoptimierungen überhaupt noch was an Performance bringen, 
-/// nachdem in dem fast_frommer-Code auf die meisten Polynomkoeffizienten nicht mehr über Addressberechnung, sondern
-/// sequentiell zugegriffen wird. Fazit: nein, kaum noch ein Performance-Unterschied.
-template <int DEGREE>
-class polynomdefsNoShift
-{
-	///due to compile problems with some compilers enums are used instead of regular member variables
-private:
-	 
-public:
-	enum {	/// maximal zulaessige Grad eines Polynommonoms mit der Einstellung DEGREE
-		maxdegree_m	= DEGREE
-	};
-
-	enum {/// Anzahl Bytes, die von einem arrayindex der Polynomkoeffizientenliste belegt werden
-		size_m	=  (DEGREE+1)*(DEGREE+1)
-	};
-	int getSize()  const { return size_m; }
-	/// compute a*(2^pshift)+b
-	inline  static short getPairIndex(const short a, const short b) 
-	{
-		return ( ( (int)(a+b)*(DEGREE+1)) + (int)b );
-	}
-};
-
-class dynamicQuadraticMatrixDefsNoShift
-{
-private:
-	int 	size_m;	///< groesse des zu reservierenden Speicherblcks
-
-	dynamicQuadraticMatrixDefsNoShift();
- 
-public:
-	const int 	dim_m;///< anzahl der spalten/zeilen
-	
-
-	inline int getSize()  const { return size_m; }
-
-	dynamicQuadraticMatrixDefsNoShift(int dimension):	size_m((dimension+1)*(dimension+1) ) ,
-										dim_m(dimension+1)	
-										
-	{
-	}
-
-	inline  short getPairIndex(const short a, const short b) const
-	{
-		return (  (int)(a*dim_m) + (int)b );
-	}
-};
-
-
-class dynamicPolynomdefsNoShift
-{
-
-private:
-	  int 	size_m;
-	dynamicPolynomdefsNoShift();
-public:
-	 int 	maxdegree_m;
-	 int 	maxdegreePlusOne_m;
-	
-
-	inline int getSize()  const { return size_m; }
-
-	dynamicPolynomdefsNoShift(int degree):	size_m((degree+1)*(degree+1) ),
-								maxdegree_m(degree),
-								maxdegreePlusOne_m(degree+1)
-	{
-	}
-
-	inline  short getPairIndex(const short a, const short b) const
-	{
-		return ( ( (int)(a+b)*maxdegreePlusOne_m) + (int)b );
-	}
-};
-
-
-/// @note für den Test: die offsets sollten 0,1,3,6,10,15,... u.s.w. sein.
-class dynamicPolynomdefsNoShiftNoMemoryHoles
-{
-private:
-	/// kann man daraus ein const int array machen?
-	int* 	offsets_m;
- 	int 	size_m;
-	dynamicPolynomdefsNoShiftNoMemoryHoles();
-	
-	
-
-public:
-	 int 	maxdegree_m;
-	 int 	maxdegreePlusOne_m;
-	
-	// wegen short getIndex()
-	bool wellDefined()
-	{
-		assert(size_m<32000);
-	}
-
-	inline int getSize()  const { return size_m; }
-
-	int computeSize(int degree)
-	{
-		int size=0;
-		for (int currDegree=0;currDegree<=degree; currDegree++)
-		{
-			offsets_m[currDegree] = size;
-			for (int yExp=0;yExp<=currDegree; yExp++)
-				size++;
-		}
-		return size;
-	}
-
-	dynamicPolynomdefsNoShiftNoMemoryHoles(int degree):	
-							offsets_m(new int[degree+1]),
-							size_m(computeSize(degree)),		
-							maxdegree_m(degree),
-							maxdegreePlusOne_m(degree+1)
-	{
-	}
-
-	inline  short getPairIndex(const short a, const short b) const
-	{
-
-		int offset=0;
-		int monomDegree = a+b;
-		for (int currDegree=0; currDegree< monomDegree; currDegree++)
-		{
-			for (int yExp=0;yExp<=currDegree; yExp++)
-				offset++;
-		}
-		assert( offsets_m[ monomDegree ] == offset );
-		offset = offset + b;
-		return offset;
-	}
-};
-
-/** @brief polynom traits*/
-/// @todo zusaetzlich mit einem Datentyp parametrisieren? - nö, Typ ist der Exponent
-/// @note diese Definitionen sind für die Verwendung als Matrix eher untauglich:
-///       man Bedenke, dass wenn eine  NxN-Matrix gespeichert werden soll, als DEGREE-Parameter (N+N=2N) übergeben werden muss.
-template <int DEGREE>
-class polynomdefsNew
-{
-	///due to compile problems with some compilers enums are used instead of regular member variables
-private:
-	enum { 
-		pshift_m = needbits<DEGREE>::value
-	};
-public:
-	enum {	/// maximal zulaessige Grad eines Polynommonoms mit der Einstellung DEGREE
-		maxdegree_m	= DEGREE
-	};
-
-	enum {/// Anzahl bytes, die von einem arrayindex der Polynomkoeffizientenliste belegt werden
-		size_m		= (nextpow2num<DEGREE>::value)*(nextpow2num<DEGREE>::value)
-	};
-
-	inline static unsigned short getSize()
-	{
-		return (nextpow2num<DEGREE>::value)*(nextpow2num<DEGREE>::value);
-	}
-	/// compute a*(2^pshift)+b
-	inline  static size_t getPairIndex(const unsigned short a, const unsigned short b) 
-	{
-		#ifdef COUNT
-			bitwiseShift	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		// Vorsicht bein shiften! muss ich pshift sicherheitshalber in ein int konvertieren ja/nein?
-		//return (((int)a<<pshift)|(int)b);
-		return ( ((int)(a+b)<<needbits<DEGREE>::value) | (int)b );
-	}
-};
-
-
-
-/** @brief polynompair traits 
- @todo Codereduzierung: polynompairdefskoennte wegfallen, wenn pair eingesetzt wird. */
-template <int DEGREE>
-class polynompairdefs
-{
-	///due to compile problems with some compilers enums are used instead of regular member variables
-private:
-	enum { 
-		pshift_m = needbits<DEGREE>::valueplusone
-	};
-public:
-	enum {	/// maximal zulaessige Grad eines Polynommonoms mit der Einstellung DEGREE
-		maxdegree_m	= DEGREE
-	};
-
-	enum {/// Anzahl bytes, die von einem arrayindex der Polynomkoeffizientenliste belegt werden
-		size_m		= 2*(nextpow2num<DEGREE>::value) * (nextpow2num<DEGREE>::value) 
-	};
-
-	int getSize()  const { return size_m; }
-	/// compute a*(2^pshift)+b
-	inline  static short 	getPairIndex(const short a, const short b) 
-	{
-		#ifdef COUNT
-			bitwiseShift 	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		// Vorsicht bein shiften! muss ich pshift sicherheitshalber in ein int konvertieren ja/nein?
-		//return (((int)a<<pshift)|(int)b);
-		return ( ((int)(a+b) << (needbits<DEGREE>::valueplusone)) | (int)(b<<1) );
-	}/// compute a*(2^pshift)+b
-
-
-	inline  static short 	getGroupIndex(const short a) 
-	{
-		#ifdef COUNT
-			bitwiseShift	+= 1;
-			bitwiseOR	+= 1;
-		#endif	
-		// Vorsicht bein shiften! muss ich pshift sicherheitshalber in ein int konvertieren ja/nein?
-		//return (((int)a<<pshift)|(int)b);
-		return ( (int) a << (needbits<DEGREE>::valueplusone) );
-	}
-};
-
-
-
-//maxdegree mei Matrixdef
-// haengt nicht vom unteren Datenyp der MAtrix ab, aber legt wohl die 
-// maximale groesse fest
-/**
-@brief 	contains template parameter definition for matrix classes (simulated by fast_polynomXY), 
-*	parametrized by char(field) during compile time
-*/
-template <short CHAR>
-class matrixdefs
-{
-private:
-	enum {
-		pshift_m = needbits<CHAR>::value
-	};
-public:
-	///Statt Variablen wurden enums verwendet, weil z.B: der Intel Compiler damit nicht zurechtkommt
-	enum {
-		maxdegree_m = nextpow2num<CHAR>::value - 1
-	};
-	enum {/// Anzahl bytes, die von einem arrayindex der Polynomkoeffizientenliste belegt werden
-		size_m	= (nextpow2num<CHAR>::value)*(nextpow2num<CHAR>::value)
-	};
-	int getSize()  const { return size_m; }
-		/// compute a*(2^pshift)+b
-		inline static  short getPairIndex(short a, short b) 
-		{
-			#ifdef COUNT
-				bitwiseShift+=1;
-				bitwiseOR+=1;
-			#endif
-			// Vorsicht bein shiften! muss ich pshift sicherheitshalber in ein int konvertieren ja/nein?
-			return ( ((int)a<<needbits<CHAR>::value) | (int)b );
-
-		}
-};
-
-
-/**
-* @brief contains template parameter definition for fast_Ring class, 
-*	 parametrized by static field characteristik during compile time
-*
-*
-*
-* @todo Parametrize with EPSPRECISION ?
-*/
-template <unsigned int CHAR, unsigned short EPSPREC>
-class kdefs_zahl_x
-{
-	public:
-	/*	static  const  short charakteristik;
-		static  const  short epsPrecision; // umbenennen in base_num_epsPrecision???
-	*/
-			
-	enum {		
-		charakteristik_m = CHAR	
-	};
-	enum {		
-		charakteristik_minus_one_m = CHAR-1
-	};
-	enum {
-		epsPrecision_m	 = EPSPREC
-	};
-};
-
-/* // this implementation does not compile with some compilers, therefore the 'enum' approach is used - leave it as syntax example!
-template <int CHAR>
-const  short kdefs_zahl_x<CHAR>::charakteristik(CHAR);
-
-template <int CHAR>
-const  short kdefs_zahl_x<CHAR>::epsPrecision(EPSPRECISION);
-*/
-
diff --git a/sandbox/hurwitz.kroeker/src/polynomialRing.cpp b/sandbox/hurwitz.kroeker/src/polynomialRing.cpp
deleted file mode 100644
index ec2778a..0000000
--- a/sandbox/hurwitz.kroeker/src/polynomialRing.cpp
+++ /dev/null
@@ -1,853 +0,0 @@
-
-/// @todo hier kann man ganz viel code sparen...
-
-#include <algorithm>
-#include <iostream>
-#include <sstream>
-
-template<class TPolynomXY, class TRing>
-PolynomialRing<TPolynomXY, TRing>::PolynomialRing(const TRing & ring): ring_ref_m(ring)
-	{
-	}
-
-
-/// @pre der Ring ring 1 hat die Elemente vom Typ  PolynomXY_Type::CoefficientType.
-template<class TPolynomXY, class TRing>
-TPolynomXY 		PolynomialRing<TPolynomXY, TRing>::addInv	 (const	TPolynomXY 	& _polynom_ref) const
-{
-
-	TPolynomXY  res(_polynom_ref.getDegree() );
-	
-	for (short  i=0; i<= _polynom_ref.getDegree(); i++)
-		{
-			for(short j=0; j<=i; j++)
-			{
-				res.setCoeff (i-j, j , ring_ref_m.addInv( _polynom_ref.getCoeffConst(i-j, j) ) );
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
-	return res;
-}
-
-
-
-
-/// @todo das Durchlaufen der Schleifen wiederholt sich, das kann man doch irgendwie abstrahieren!
-template<class TPolynomXY, class TRing>
-TPolynomXY*		PolynomialRing<TPolynomXY, TRing>::addInvReturnPtr(const	TPolynomXY 	& _polynom_ref	) const
-{
-	TPolynomXY * res= new TPolynomXY(_polynom_ref.getDegree() );
-	
-	for (short  i=0; i<= _polynom_ref->getDegree(); i++)
-		{
-			for(short j=0; j<=i; j++)
-			{
-				res->setCoeff (i-j, j , ring_ref_m.addInv( _polynom_ref.getCoeffConst(i-j, j) ) );
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
-	return res;
-}
-
-
-template<class TPolynomXY, class TRing>
-	void 			PolynomialRing<TPolynomXY, TRing>::addInvInPlace(	TPolynomXY 	& _polynom_ref	) const
-{
-
-	for (short  i=0; i<= _polynom_ref->getDegree(); i++)
-		{
-			for(short j=0; j<=i; j++)
-			{
-				ring_ref_m.addInvInPlace( _polynom_ref.getCoeffRef(i-j, j) );
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
-	return ;
-}
-
-
-template<class TPolynomXY, class TRing>
-TPolynomXY 		PolynomialRing<TPolynomXY, TRing>::add(const TPolynomXY & _polynom_1_ref,
-										const TPolynomXY & _polynom_2_ref) const
-{
-
-	// add polynoms for different Degree currently not implemented.
-	assert(_polynom_1_ref.getDegree()==_polynom_2_ref.getDegree() );
-
-    std::cerr << "_polynom_1_ref.getDegree() " << _polynom_1_ref.getDegree()<< std::endl;
-    std::cerr << "_polynom_1_ref.getDegree() " << _polynom_2_ref.getDegree()<< std::endl;
-
-	const short resDegree= max(_polynom_1_ref.getDegree(),_polynom_2_ref.getDegree() );
-	TPolynomXY  res (resDegree );
-	//i-j is the x-exp and j is the y-exp., i is the currentMonomDegree
-	for (short  currMonomDegree=0; currMonomDegree<= resDegree; currMonomDegree++)
-		{
-			for(short yExp=0; yExp<=currMonomDegree; yExp++)
-			{
-				short xExp = currMonomDegree - yExp;
-
-				res.setCoeff (xExp, yExp , ring_ref_m.add(	_polynom_1_ref.getCoeffConst(xExp, yExp ),
-										_polynom_2_ref.getCoeffConst(xExp, yExp ) 
-								)
-							);
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
-	return res;
-}
-
-template<class TPolynomXY, class TRing>
-TPolynomXY* 	PolynomialRing<TPolynomXY, TRing>::addReturnPtr( const	TPolynomXY 	 & _polynom_1_ref,
-											const	TPolynomXY 	 & _polynom_2_ref) const
-{
-// add polynoms for different Degree currently not implemented.
-	assert(_polynom_1_ref.getDegree()==_polynom_2_ref.getDegree() );
-
-	const short resDegree= max(_polynom_1_ref.getDegree(),_polynom_2_ref.getDegree);
-	TPolynomXY *  res = new TPolynomXY(resDegree );
-	//i-j is the x-exp and j is the y-exp., i is the currentMonomDegree
-	for (short  currMonomDegree=0; currMonomDegree<= resDegree; currMonomDegree++)
-		{
-			for(short yExp=0; yExp<=currMonomDegree; yExp++)
-			{
-				short xExp = currMonomDegree - yExp;
-
-				res->setCoeff (xExp, yExp , ring_ref_m.add(	_polynom_1_ref.getCoeffConst(xExp, yExp ),
-										_polynom_2_ref.getCoeffConst(xExp, yExp ) 
-								)
-							);
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
-	return res;
-}
-
-
-template<class TPolynomXY, class TRing>
-inline void 			PolynomialRing<TPolynomXY, TRing>::addInPlace( 	TPolynomXY 			& _polynom_1_ref,
-											const TPolynomXY 		& _polynom_2_ref) const
-{
-	// add polynoms for different Degree currently not implemented.
-	assert(_polynom_1_ref.getDegree() == _polynom_2_ref.getDegree() );
-
-	//i-j is the x-exp and j is the y-exp., i is the currentMonomDegree
-	for (short  currMonomDegree=0; currMonomDegree<= _polynom_1_ref.getDegree(); currMonomDegree++)
-		{
-			for(short yExp=0; yExp<=currMonomDegree; yExp++)
-			{
-				short xExp = currMonomDegree - yExp;
-
-					ring_ref_m.addInPlace(	_polynom_1_ref.getCoeffRef(xExp, yExp ),
-							_polynom_2_ref.getCoeffConst(xExp, yExp ) 
-							);
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
-	return ;
-}
-
-
-template<class TPolynomXY, class TRing>
-TPolynomXY 		PolynomialRing<TPolynomXY, TRing>::scalarMultiply(const typename TPolynomXY::CoefficientType 	scalar,
-										 const	TPolynomXY 			& _polynom_ref) const
-{
-	TPolynomXY  res( _polynom_ref.getDegree() );
-	//i-j is the x-exp and j is the y-exp., i is the currentMonomDegree
-	for (short  currMonomDegree=0; currMonomDegree<= _polynom_ref.getDegree(); currMonomDegree++)
-		{
-			for(short yExp=0; yExp <= currMonomDegree; yExp++)
-			{
-				short xExp = currMonomDegree - yExp;
-
-				res.setCoeff (xExp, yExp , ring_ref_m.scalarMultiply(	scalar,
-											_polynom_ref.getCoeffConst( xExp, yExp ) 
-							)
-					);
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
- 	//short polynomDegree = _polynom_ref.getDegree()
-	//short xexp,yexp, currDegree;
-	// begin(xexp,yexp,currDegree, polynomDegree);
-	// while (next (xexp,yexp,polynomDegree))
-	//for (begin(xexp,yexp,polynomDegree); !end(currDegree, polynomDegree);  next (xexp, yexp, currDegree, polynomDegree))
-	//	res.setCoeff (xExp, yExp , ring_ref_m.scalarMultiply(	scalar,
-	//										_polynom_ref.getCoeffConst( xExp, yExp ) 
-	//						)
-	//				);
-	return res;
-}
-
-
-/*
-// so ungefähr könnte man es mit dem Durchlaufen der Monome machen: begin() und next()
-// da brauchst du aber strenggenommen eine const-iterator, einen Ref-Iterator und einen normalen Iterator
-inline bool begin(short & xexp, short & yexp , short currDegree, int polynomialDegree)
-{ 
-	currDegree = 0;
-	xexp = 0;
-	yexp = 0;
-	return ( polynomialDegree>=0 );
-}
-
-inline bool end(  short & currDegree, int polynomialDegree)
-{ 
-	return  (currDegree<=polynomialDegree);
-}
-
-// so ungefähr könnte man ex machen.
-inline bool nextMonomExp(short & xexp, short & yexp, short &currDegree, int polynomialDegree)
-{
-	//short currDegree = xexp + yexp;
-	if (yexp<currDegree)
-	{
-		yexp++;
-		xexp--;
-	}
-	else 
-	{
-		currDegree++;
-		xexp=currDegree;
-		yexp=0;
-		if (currDegree>polynomialDegree)
-			return false;
-	}
-	return true;
-
-}*/
-
-template<class TPolynomXY, class TRing>
-void 		PolynomialRing<TPolynomXY, TRing>::scalarMultiplyInPlace(const typename TPolynomXY::CoefficientType 	scalar,
-										TPolynomXY 				& _polynom_ref	) const
-{
- 
-	//i-j is the x-exp and j is the y-exp., i is the currentMonomDegree
-	for (short  currMonomDegree=0; currMonomDegree<= _polynom_ref.getDegree(); currMonomDegree++)
-		{
-			for(short yExp=0; yExp <= currMonomDegree; yExp++)
-			{
-				short xExp = currMonomDegree - yExp;
-
-				/*_polynom_ref.setCoeff (xExp, yExp , ring_ref_m.scalarMultiply(	scalar,
-												_polynom_ref.getCoeffConst( xExp, yExp ) 
-							)
-					);*/
-					 ring_ref_m.scalarMultiplyInPlace(scalar, _polynom_ref.getCoeffRef (xExp, yExp) );
-
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
-}
-
-template<class TPolynomXY, class TRing>
-TPolynomXY*	PolynomialRing<TPolynomXY, TRing>::scalarMultiplyRetPtr(const	typename TPolynomXY::CoefficientType 	scalar,
-										const	TPolynomXY 			& _polynom_ref) const
-{
-	
-	TPolynomXY*  res = new TPolynomXY( _polynom_ref.getDegree() );
-	//i-j is the x-exp and j is the y-exp., i is the currentMonomDegree
-	for (short  currMonomDegree=0; currMonomDegree<= _polynom_ref.getDegree(); currMonomDegree++)
-		{
-			for(short yExp=0; yExp <= currMonomDegree; yExp++)
-			{
-				short xExp = currMonomDegree - yExp;
-
-				res->setCoeff (xExp, yExp , ring_ref_m.scalarMultiply(	scalar,
-											_polynom_ref.getCoeffConst( xExp, yExp ) 
-							)
-					);
-				#ifdef COUNT
-					addCount+=1;
-				#endif
-			}
-		}
- 	//short polynomDegree = _polynom_ref.getDegree()
-	//short xexp,yexp, currDegree;
-	// begin(xexp,yexp,currDegree, polynomDegree);
-	// while (next (xexp,yexp,polynomDegree))
-	//for (begin(xexp,yexp,polynomDegree); !end(currDegree, polynomDegree);  next (xexp, yexp, currDegree, polynomDegree))
-	//	res.setCoeff (xExp, yExp , ring_ref_m.scalarMultiply(	scalar,
-	//										_polynom_ref.getCoeffConst( xExp, yExp ) 
-	//						)
-	//				);
-	return res;
-}
-
-/// @pre: srcPol!=destPol
-template<class TPolynomXY, class TRing>
-template <class TPolynomXY_SRC_Type, class TPolynomXY_DEST_Type>
-void 	PolynomialRing<TPolynomXY, TRing>::copyPolynomWithGivenEpsPrecision(const TPolynomXY_SRC_Type  & srcPol,
-									 TPolynomXY_DEST_Type  	&	 destPol, int epsPrecision)
-{	
-	//assert((&srcPol) != (&destPol)) ;
-
-	for (int deg = srcPol.getDegree(); deg>=0; deg--)
-	{
-		for (int x_exp=deg; x_exp>=0; x_exp--)
-		{
-			int MaxEpsPrecision= min(epsPrecision, (int)srcPol.getCoeff(x_exp, deg-x_exp).getEpsPrecision() );
-
-			for (int prec=0; prec<= MaxEpsPrecision ; prec++)
-			{
-				destPol.getCoeffRef(	x_exp, deg-x_exp).setValue(prec, 0);
-			}
-
-			
-			for (int prec=0; prec<= MaxEpsPrecision ; prec++)
-			{
-				destPol.getCoeffRef(	x_exp, deg-x_exp).setValue(prec,
-											srcPol.getCoeff(x_exp, deg-x_exp).getValue(prec) );
-			}
-		}
-	}
-}
-
-
-
-template<class TPolynomXY, class TRing>
-template <class TPolynomXY_Type>
-void 	PolynomialRing<TPolynomXY, TRing>::convertInPlace( TPolynomXY_Type  & pol ) const
-{
-	for (int deg = pol.getDegree(); deg>=0; deg--)
-	{
-		for (int x_exp=deg; x_exp>=0; x_exp--)
-		{
-			int MaxEpsPrecision= (int)pol.getCoeff(x_exp, deg-x_exp).getEpsPrecision();
-			for (int prec=0; prec<= MaxEpsPrecision ; prec++)
-			{
-				pol.getCoeffRef(	x_exp, deg-x_exp).setValue(prec,
-											ring_ref_m.ConvertScalar(pol.getCoeff(x_exp, deg-x_exp).getValue(prec)) );
-			}
-		}
-	}
-}
-
-
-
-/////////////////////////////////////////////////////////////////////////////////////////////
-template<class TPolynomX, class TRing>
-UnivariatePolynomialRing<TPolynomX, TRing>::UnivariatePolynomialRing(const TRing & ring): ring_ref_m(ring)
-	{
-	}
-
-template<class TPolynomX, class TRing>
-TPolynomX 		UnivariatePolynomialRing<TPolynomX, TRing>::scalarMultiply(const typename TPolynomX::CoefficientType 	scalar,
-											 const	TPolynomX 			& _polynom_ref) const
-{
-	int polynomialDegree =_polynom_ref.getDegree();
-
-	TPolynomX  res( polynomialDegree  );
-
-
-
-	for(short xExp=0; xExp <= polynomialDegree; xExp++)
-	{
-				res.setCoeff (xExp,  ring_ref_m.scalarMultiply(	scalar,	_polynom_ref.getCoeffConst( xExp ) 
-							)
-					);
-	}
-
-	return res;
-
-}
-
-
-
-template<class TPolynomX, class TRing>
-TPolynomX 		UnivariatePolynomialRing<TPolynomX, TRing>::addInv( const	TPolynomX 			& _polynom_ref) const
-{
-	int polynomialDegree =_polynom_ref.getDegree();
-
-	TPolynomX  res( polynomialDegree  );
-
-
-	for(short xExp=0; xExp <= polynomialDegree; xExp++)
-	{
-				res.setCoeff (xExp,  ring_ref_m.addInv(	_polynom_ref.getCoeffConst( xExp ) 	)	);
-	}
-
-	return res;
-
-}
-
-template<class TPolynomX, class TRing>
-TPolynomX 		UnivariatePolynomialRing<TPolynomX, TRing>::add( const	TPolynomX 			& _polynom_ref1,  
-										const	TPolynomX 			& _polynom_ref2) const
-{
-	int polynomialDegree = std::max(_polynom_ref1.getDegree(),_polynom_ref2.getDegree() );
-
-	TPolynomX  res( polynomialDegree  );
-
-
-	for(short xExp=0; xExp <= polynomialDegree; xExp++)
-	{
-				res.setCoeff (xExp,  ring_ref_m.add(	_polynom_ref1.getSafeCoeffConst( xExp ) 	 ,
-											_polynom_ref2.getSafeCoeffConst( xExp ) 	
-									)
-						);
-	}
-
-	return res;
-
-}
-
-
-
-template<class TPolynomX, class TRing>
-TPolynomX 		UnivariatePolynomialRing<TPolynomX, TRing>::multiply( const	TPolynomX 			& _polynom_ref1,  
-										const	TPolynomX 			& _polynom_ref2) const
-{
-	short int pol_1_deg= _polynom_ref1.getDegree();
-	short int pol_2_deg= _polynom_ref2.getDegree();
-
-	short int polynomialDegree =   pol_1_deg + pol_2_deg ;
-
-	TPolynomX  res( polynomialDegree  );
-
-
-	for(short xExp=0; xExp <= polynomialDegree; xExp++)
-	{
-		short int xfinish = std::min( xExp,    pol_1_deg     ); 
-		short int xstart  = std::max( 0,    xExp - pol_2_deg );
-
-		for ( short x=xfinish; x>= xstart; x--)
-		{
-
-			if (x <=pol_1_deg && (xExp-x) <=  pol_2_deg )
-			{
-				ring_ref_m.addInPlace(	res.getCoeffRef(xExp), 
-											ring_ref_m.multiply( _polynom_ref1.getCoeffConstRef(x),
-														 _polynom_ref2.getCoeffConstRef(xExp-x)
-											
-										)
-							);
-			}
-		}
-	}
-
-	return res;
-}
-
-
-
-template<class TPolynomX, class TRing>
-TPolynomX* 		UnivariatePolynomialRing<TPolynomX, TRing>::multiplyPtr( const	TPolynomX 			& _polynom_ref1,  
-										const	TPolynomX 			& _polynom_ref2) const
-{
-	short int pol_1_deg= _polynom_ref1.getDegree();
-	short int pol_2_deg= _polynom_ref2.getDegree();
-
-	short int polynomialDegree =   pol_1_deg + pol_2_deg ;
-
-	TPolynomX*   resPtr = new TPolynomX( polynomialDegree  );
-	TPolynomX&   res(*resPtr);
-
-	for(short xExp=0; xExp <= polynomialDegree; xExp++)
-	{
-		short int xfinish = std::min( xExp,    pol_1_deg     ); 
-		short int xstart  = std::max( 0,    xExp - pol_2_deg );
-
-		for ( short x=xfinish; x>= xstart; x--)
-		{
-
-			if (x <=pol_1_deg && (xExp-x) <=  pol_2_deg )
-			{
-				ring_ref_m.addInPlace(	res.getCoeffRef(xExp), 
-											ring_ref_m.multiply( _polynom_ref1.getCoeffConstRef(x),
-														 _polynom_ref2.getCoeffConstRef(xExp-x)
-											
-										)
-							);
-			}
-		}
-	}
-
-	return resPtr;
-}
-
-template<class TPolynomX, class TRing>
-    void    UnivariatePolynomialRing<TPolynomX, TRing>::normalizeInPlace(TPolynomX          & _polynom_ref1) const
-{
-    int degree=_polynom_ref1.getExactDegree();
-    typename TRing::ElementType    correctionCoeff = ring_ref_m.multInv( _polynom_ref1.getCoeff(degree) ) ;
-    for ( int currExponent= degree; currExponent>=0; currExponent--)
-          ring_ref_m.multiplyInPlace( _polynom_ref1.getCoeffRef(currExponent), correctionCoeff );
-    return;
-}
-
-
-template<class TPolynomX, class TRing>
-TPolynomX 		UnivariatePolynomialRing<TPolynomX, TRing>::square( const	TPolynomX 			& _polynom_ref1 ) const
-{
-	short int pol_1_deg= _polynom_ref1.getDegree();
-
-	short int polynomialDegree =   pol_1_deg + pol_1_deg ;
-
-	TPolynomX  res( polynomialDegree  );
-
-
-	for(short xExp=0; xExp <= polynomialDegree; xExp++)
-	{
-		short int xfinish = std::min( xExp,    pol_1_deg     ); 
-		short int xstart  = std::max( 0,    xExp - pol_1_deg );
-
-		for ( short x=xfinish; x>= xstart; x--)
-		{
-
-			if (x <=pol_1_deg && (xExp-x) <=  pol_1_deg )
-			{
-				ring_ref_m.addInPlace(	res.getCoeffRef(xExp), 
-											ring_ref_m.multiply( _polynom_ref1.getCoeffConstRef(x),
-														 _polynom_ref1.getCoeffConstRef(xExp-x)
-											
-										)
-							);
-			}
-		}
-	}
-
-	return res;
-}
- 
-
-
-template<class TPolynomX, class TRing>
-pair<TPolynomX,TPolynomX> 		UnivariatePolynomialRing<TPolynomX, TRing>::divide( const	TPolynomX 			& dividend,  
-										const	TPolynomX 			& divisor) const
-{
-/*
-	FOR i = GradZ - GradN TO 0 STEP -1
-		Quotient(i) = Zähler(i + GradN) / Nenner(GradN)
-		FOR j = GradN TO 0 STEP -1
-			Zähler(i + j) = Zähler(i + j) - Nenner(j) * Quotient(i)
-		NEXT j
-	NEXT i
-	FOR j = GradN - 1 TO 0 STEP -1
-    		Rest(j) = Zähler(j)
-	NEXT j
-	*/
-
-	assert(! divisor.isZero() );
-	TPolynomX dividend_copy(dividend);
-
-	int dividend_deg= dividend.getExactDegree();
-	int divisor_deg = divisor.getExactDegree();
-
-    if (dividend_deg - divisor_deg <0)
-    {
-          //res(0 );
-        return pair<TPolynomX,TPolynomX>( TPolynomX(0), dividend );
-    }
-    
-	TPolynomX  res( dividend_deg - divisor_deg  );
-
-	for (int i = dividend_deg - divisor_deg; i>=0; i--)
-	{
-		res.setCoeff(i, ring_ref_m.multiply( dividend_copy.getCoeffConstRef(i + divisor_deg),  
-								  ring_ref_m.multInv(divisor.getCoeffConstRef( divisor_deg) ) 	
-								)
-				);
-
-		for (int j=divisor_deg; j>=0; j--)
-			 ring_ref_m.addInPlace(	dividend_copy.getCoeffRef( i + j ),
-							ring_ref_m.addInv(ring_ref_m.multiply( res.getCoeffConst(i), divisor.getCoeffConst(j) ) )
-						);
-		
-	}
-	TPolynomX remainder(dividend_copy.getExactDegree() );
-
-	for (int i = dividend_copy.getExactDegree(); i>=0; i--)
-	{
-		remainder.setCoeff(i, dividend_copy.getCoeffConst(i) );
-	}
-
-	return pair<TPolynomX,TPolynomX>(res, remainder);
-}
-
-
-template<class TPolynomX, class TRing>
-TPolynomX		UnivariatePolynomialRing<TPolynomX, TRing>::remainder( const	TPolynomX 			& dividend,  
-										const	TPolynomX 			& divisor) const
-{
-/*
-	FOR i = GradZ - GradN TO 0 STEP -1
-		Quotient(i) = Zähler(i + GradN) / Nenner(GradN)
-		FOR j = GradN TO 0 STEP -1
-			Zähler(i + j) = Zähler(i + j) - Nenner(j) * Quotient(i)
-		NEXT j
-	NEXT i
-	FOR j = GradN - 1 TO 0 STEP -1
-    		Rest(j) = Zähler(j)
-	NEXT j
-	*/
-
-	assert(! divisor.isZero() );
-	TPolynomX dividend_copy(dividend);
-
-	int dividend_deg= dividend.getExactDegree();
-	int divisor_deg = divisor.getExactDegree();
-
-	for (int i = dividend_deg - divisor_deg; i>=0; i--)
-	{
-		typename TRing::ElementType el =ring_ref_m.multiply( dividend_copy.getCoeffConstRef(i + divisor_deg),  
-								  ring_ref_m.multInv(divisor.getCoeffConstRef( divisor_deg) ) 	
-								);
-
-		for (int j=divisor_deg; j>=0; j--)
-			 ring_ref_m.addInPlace(	dividend_copy.getCoeffRef( i + j ),
-							ring_ref_m.addInv(ring_ref_m.multiply( el, divisor.getCoeffConst(j) ) )
-						);
-		
-	}
-	TPolynomX remainder(dividend_copy.getExactDegree() );
-
-	for (int i = dividend_copy.getExactDegree(); i>=0; i--)
-	{
-		remainder.setCoeff(i, dividend_copy.getCoeffConst(i) );
-	}
-
-	return remainder;
-}
-
-template<class TPolynomX, class TRing>
-TPolynomX 		UnivariatePolynomialRing<TPolynomX, TRing>::pow(	const TPolynomX 	& polynom,
-										unsigned int 	exponent  ) const
-{
-	
-	if (exponent==0)
-	{
-		TPolynomX	res(0);
-		res.setCoeff(0,TRing::ElementType::One);
-		return res;
-	}
-	TPolynomX	res(polynom);
-	while (exponent>1)
-	{
-		res=multiply(res,polynom);
-		exponent--;
-	}
-	return res;
-}
-
-
-template<class TPolynomX, class TRing>
-TPolynomX		UnivariatePolynomialRing<TPolynomX, TRing>::gcd( const	TPolynomX 			& pol1_ref,  
-										const	TPolynomX 			& pol2_ref) const
-{
-	TPolynomX 			 pol1 (  pol1_ref);  
-	TPolynomX 			 pol2 (  pol2_ref);
-
-	TPolynomX 			* pol1_p =  & pol1;  
-	TPolynomX 			* pol2_p =  & pol2;
-
-	if ( pol1_ref.getExactDegree() < pol2_ref.getExactDegree() )
-	{
-		pol1_p = & pol2;
-		pol2_p = & pol1;
-	}	
-
-	assert(! (*pol2_p).isZero() );
-
-	/*	rk−2(x) = qk(x) rk−1(x) + rk(x) */
-
-	// Plan: zwei Polynome , und zwei Zeiger 'prev' und 'curr' die nach jedem Schritt wecseln. 
-	//std::cerr << " *pol1_p: " << *pol1_p << std::endl;
-	//std::cerr << " *pol2_p: " << *pol2_p << std::endl;
-	TPolynomX	prev=*pol2_p;
-	pair<TPolynomX,TPolynomX> divres = divide(*pol1_p,*pol2_p);
-
-	while (! divres.second.isZero() )
-	{
- 		*pol1_p = prev;
-		//pol2_p = &(divres.second);
-		prev=divres.second;
-		pol2_p= &prev;
-		//std::cerr << "div result: " << divres.first << std::endl;
-		//std::cerr << "div remainder: " << *pol2_p << std::endl;
-		//assert(! (*pol2_p).isZero() );
-		divres = divide( *pol1_p, *pol2_p );
-		//std::cerr << "2. div result: " << divres.first << std::endl;
-		//std::cerr << "2 div remainder: " <<divres.second << std::endl;
-		//std::cerr << "*pol2_p: " <<*pol2_p << std::endl;
-		
-	}
-	//std::cerr << " *pol1_p: " << *pol1_p << std::endl;
-	//std::cerr << " *pol2_p: " << *pol2_p << std::endl;
-
-	return prev;
-
-}
-
-
-template<class TPolynomX, class TRing>
-TPolynomX		UnivariatePolynomialRing<TPolynomX, TRing>::fastgcd( const	TPolynomX 			& pol1_ref,  
-										const	TPolynomX 			& pol2_ref) const
-{
-	TPolynomX 			 pol1 (  pol1_ref);  
-	TPolynomX 			 pol2 (  pol2_ref);
-
-	TPolynomX 			* pol1_p =  & pol1;  
-	TPolynomX 			* pol2_p =  & pol2;
-
-	if ( pol1_ref.getExactDegree() < pol2_ref.getExactDegree() )
-	{
-		pol1_p = & pol2;
-		pol2_p = & pol1;
-	}	
-
-	assert(! (*pol2_p).isZero() );
-
-	/*	rk−2(x) = qk(x) rk−1(x) + rk(x) */
-
-	// Plan: zwei Polynome , und zwei Zeiger 'prev' und 'curr' die nach jedem Schritt wecseln. 
-	//std::cerr << " *pol1_p: " << *pol1_p << std::endl;
-	//std::cerr << " *pol2_p: " << *pol2_p << std::endl;
-	TPolynomX	prev=*pol2_p;
-	TPolynomX divrem = remainder(*pol1_p,*pol2_p);
-
-	while (! divrem.isZero() )
-	{
- 		*pol1_p = prev;
-		prev=divrem;
-		divrem = remainder( *pol1_p, prev );
-	}
-	
-
-	return prev;
-}
-
-template<class TPolynomX, class TRing>
-bool		UnivariatePolynomialRing<TPolynomX, TRing>::fastgcdspec( TPolynomX 			& pol1_ref,  
-												const	TPolynomX 		& pol2_ref,
-												int 				minDeg) const
-{
-
-	//assert ( pol1_ref.getExactDegree() >= pol2_ref.getExactDegree() );
-	assert(! (pol2_ref).isZero() );
-
-	/*	rk−2(x) = qk(x) rk−1(x) + rk(x) */
-	TPolynomX		rkm1= pol2_ref ;
-	TPolynomX		rkm2= pol1_ref ;
-
-	TPolynomX	*	rkm2_p= &rkm2;
-	TPolynomX	*	rkm1_p= &rkm1 ;
-
-
-	if ( pol1_ref.getExactDegree() < pol2_ref.getExactDegree() )
-	{
-		rkm2_p = & rkm1;
-		rkm1_p = & rkm2;
-	}	
- 
-	// um Kopieren zu vermeiden, brauchst du doch drei Polynome..damit diese nicht ständig erzeugt werden, sollten diese mit übergeben werden.
-	TPolynomX	*	rk_p =  rkm2_p ;
-	
-	*rk_p  = remainder(*rkm2_p, *rkm1_p);
-
-	while (! rk_p->isZero() )
-	{
-		if (rkm1_p->getExactDegree()<minDeg )
-		{
-			//std::cerr <<" (rk_p->getExactDegree()- minDeg )" << (rkm1_p->getExactDegree()- minDeg ) << std::endl;
-			return false;
-		}
-		rkm2_p = rkm1_p;
-		rkm1_p = rk_p;
-		rk_p = rkm2_p;
-		*rk_p = remainder( *rkm2_p, *rkm1_p );
-	}
-	pol1_ref= *rkm1_p;
-
-	if (rkm1_p->getExactDegree()<minDeg )
-		{
-			//std::cerr <<" (rk_p->getExactDegree()- " << minDeg <<")" << (rkm1_p->getExactDegree()- minDeg ) << std::endl;
-			return false;
-		}
-
-	return true;
-}
-
-
-template<class TPolynomX, class TRing>
-TPolynomX		UnivariatePolynomialRing<TPolynomX, TRing>::diff( const	TPolynomX 			& pol)	const
-{
-	int eDeg =  pol.getExactDegree(); 
-	TPolynomX	res( std::max(0, eDeg-1 ) );
-	for (int x_exp= eDeg; x_exp>0; x_exp--)
-		res.setCoeff( x_exp-1 ,    ring_ref_m.multiply( ring_ref_m.Convert(x_exp) , pol.getCoeff( x_exp ) ));
-	
-	return res;
-};
-
-
-  template<class TPolynomX, class TRing>
-        inline std::string  UnivariatePolynomialRing<TPolynomX, TRing>::coeffToGeneratorExponentGAPStr(const CoeffType z1) const
-        {
-            if (z1.isZero() )
-                return "z";
-         
-            std::stringstream oss;
-           
-             ( ring_ref_m.elemToGeneratorExponent(z1) ) >> oss ;
-            
-            return oss.str();   
-        }
-
-
-
-template<class TPolynomX, class TRing>
-void		UnivariatePolynomialRing<TPolynomX, TRing>::diffInPlace( TPolynomX 			& pol)	const
-{
-	int eDeg =  pol.getExactDegree(); 
-	 
-	for (int x_exp= 0; x_exp<eDeg; x_exp++)
-		pol.setCoeff( x_exp ,    ring_ref_m.multiply( ring_ref_m.Convert(x_exp+1) , pol.getCoeffConst( x_exp+1 ) ));
-
-	pol.setCoeff( eDeg,TRing::ElementType::Zero);
-
-	return ;
-};
-
-
-template<class TPolynomX, class TRing>
-typename UnivariatePolynomialRing<TPolynomX, TRing>::CoeffType 		UnivariatePolynomialRing<TPolynomX, TRing>::evalAt(const TPolynomX & polynom1 ,  CoeffType  el) const
-{
-	typename TRing::ElementType res=0;
-	int eDeg=polynom1.getDegree();
-	for (int x_exp= 0; x_exp<=eDeg; x_exp++)
-	{
- 		ring_ref_m.addInPlace(res, ring_ref_m.multiply( polynom1.getCoeffConst(x_exp),ring_ref_m.pow(el,x_exp)));
-	}
-	return res;
-
-}
-
-template<class TPolynomX, class TRing> 
-TPolynomX       UnivariatePolynomialRing<TPolynomX, TRing>::subst(  const TPolynomX     & polynom,    const TPolynomX      & substPol      ) const
-{
-
-    TPolynomX respol;
-        int eDeg=polynom.getDegree();
-     for (int x_exp= 0; x_exp<=eDeg; x_exp++)   
-    {
-        respol = add(respol, scalarMultiply(polynom.getCoeff(x_exp), pow(substPol,x_exp)));
-    }
-    return respol;
-}
-
diff --git a/sandbox/hurwitz.kroeker/src/polynomialRing.h b/sandbox/hurwitz.kroeker/src/polynomialRing.h
deleted file mode 100644
index 5b87d9e..0000000
--- a/sandbox/hurwitz.kroeker/src/polynomialRing.h
+++ /dev/null
@@ -1,198 +0,0 @@
-#pragma once
-
-/*
-class expIterator
-{
-	short degree_m;
-	short currDegree_m;
-	pair<short>	xyexp;
-	
-	expIterator(polynomDegree)
-	
-	bool end()
-
-	
-	bool next()
-	{
-		if (yexp<currDegree)
-	{
-		yexp++;
-		xexp--;
-	}
-	else 
-	{
-		currDegree++;
-		if (currDegree>polynomialDegree)
-			return false;
-		else
-		{
-			xexp=currDegree;
-			yexp=0;
-		}
-	}
-	}
-
-};*/
-
-
-/// @note Polynomring in zwei Variablen - naja, fast ein Polynomring, Multiplikation und Division wird erst implementiert, wenn diese gebraucht wird.
-/// TODO Variablentyp für Maximalen Polynomgrad muss TPolynomXY vorgeben!
-/// TODO typedef tring und tpolynomxy ueberall gleich durchfuehren!
-template<class TPolynomXY, class TRing>
-class PolynomialRing
-{
-	
-public :
-
-	typedef 	TPolynomXY		PolynomXY;
-
-	typedef 	TRing		RingType;
-
-	
-	const RingType & 	ring_ref_m;
-	
-
-	PolynomialRing(const RingType & ring);
-
-	/** @name additive Inverse
-	  @{ */
-
-		TPolynomXY 		addInv		(const TPolynomXY  & polynom) const;
-	
-		TPolynomXY*		addInvReturnPtr	(const TPolynomXY  & polynom) const;
-		
-		void 			addInvInPlace	(	TPolynomXY & polynom) const;
-
-	/** @} */
-
-
-	/** @name add polynoms
-	  @{ */
-		TPolynomXY 		add(		const TPolynomXY & polynom1,
-									const TPolynomXY & polynom2 ) const;
-	
-		TPolynomXY* 	addReturnPtr( 	const TPolynomXY & polynom1,
-									const TPolynomXY & polynom2	) const;
-	
-		inline void 			addInPlace( 		TPolynomXY & polynom1,
-									const 	TPolynomXY & polynom2) const;
-	/** @} */
-
-
-	/** @name scalar multiply
-	  @{ */
-		TPolynomXY 		scalarMultiply(	const typename TPolynomXY::CoefficientType 	scalar,
-								const TPolynomXY 				& polynom			) const;
-		
-		inline void 		scalarMultiplyInPlace(const 	typename TPolynomXY::CoefficientType	 scalar,
-									TPolynomXY 					& polynom		) const;
-	
-		TPolynomXY*		scalarMultiplyRetPtr(	const	typename TPolynomXY::CoefficientType 	scalar,
-									const TPolynomXY 					& polynom	) const;
-	/** @} */
-
-	
-
-
-	/** @name convert
-	  @{ */
-
-		//TPolynomXY	convert(	const typename TPolynomXY pxy ) const ;
-
-		template <class TPolynomXY_Type>
-		void 	convertInPlace( TPolynomXY_Type & pxy) const ;
-
-		
-		template <class TPolynomXY_SRC_Type, class TPolynomXY_DEST_Type>
-		static void 	 copyPolynomWithGivenEpsPrecision(const TPolynomXY_SRC_Type  & srcPol,
-								 TPolynomXY_DEST_Type  	&	 destPol, int epsPrecision);
-
-	/** @} */
-	
-};
-
-template<class TPolynomX, class TRing>
-class UnivariatePolynomialRing
-{
-	
-public :
-
-	typedef 	TPolynomX		Element;
-	typedef 	TPolynomX		ElementType;
-
-	typedef 	typename TRing::ElementType	CoeffType;
-
-
-	typedef 	TRing		RingType;
-
-    typedef     TRing       CoeffRingType;
- 
-
-	const RingType & 	ring_ref_m;
-
-	const TRing	&	getRing()	const	{	return ring_ref_m;};
-
-    const TRing &   getCoeffRing()   const   {   return ring_ref_m;};
-
-   inline std::string  coeffToGeneratorExponentGAPStr(const CoeffType z1) const;
-
-
-	
-	UnivariatePolynomialRing(const RingType & ring);
-
-    void    normalizeInPlace(TPolynomX   &  ) const;
-
-
-	TPolynomX 		addInv		(const TPolynomX  & polynom) const;
-
-	TPolynomX 		add(		const TPolynomX & polynom1,
-						const TPolynomX & polynom2 ) const;
-
-
-	TPolynomX 		scalarMultiply(	const typename TPolynomX::CoefficientType 	scalar,
-							const TPolynomX 				& polynom			) const;
-
- 
-	TPolynomX 		multiply(			const TPolynomX 				& polynom1,
-								const TPolynomX 				& polynom2			) const;
-								
-	TPolynomX* 		multiplyPtr(			const TPolynomX 				& polynom1,
-								const TPolynomX 				& polynom2			) const;
-								
-								
-	TPolynomX 		square(				const TPolynomX 				& polynom1) const;
-
-	// Returns (result,remainder)-pair
-	pair<TPolynomX,TPolynomX> 		divide(	const TPolynomX 				& dividend,
-							const TPolynomX 				& divisor
-							) const;
-	TPolynomX 		remainder(	const TPolynomX 				& dividend,
-							const TPolynomX 				& divisor
-							) const;
-
-
-	TPolynomX 		gcd(				const TPolynomX 				& polynom1,
-								const TPolynomX 				& polynom2			) const;
-	TPolynomX 		fastgcd(				const TPolynomX 				& polynom1,
-								const TPolynomX 				& polynom2			) const;
-
-	bool 		fastgcdspec(				TPolynomX 				& polynom1,
-								const TPolynomX 				& polynom2			,
-								int minDegree) const;
-
-
-	TPolynomX 		diff(				const TPolynomX 				& polynom1 			) const;
-
-	void 			diffInPlace(	 TPolynomX 				& polynom1 					) const;
-
-	TPolynomX 		pow(				const TPolynomX 				& polynom, unsigned int exponent 			) const;
-
-    TPolynomX       subst(                const TPolynomX                 & polynom,          const TPolynomX                 & substPol          ) const;
-	 
-
-	CoeffType 		evalAt(const TPolynomX & polynom1 , CoeffType  el) const;
-
-};
-
-
-#include "polynomialRing.cpp"
diff --git a/sandbox/hurwitz.kroeker/src/random.cpp b/sandbox/hurwitz.kroeker/src/random.cpp
deleted file mode 100644
index f1865fc..0000000
--- a/sandbox/hurwitz.kroeker/src/random.cpp
+++ /dev/null
@@ -1,175 +0,0 @@
-
-
-#include "random.h"
-
-
-
-/** @file random.cpp
-*
-* @ingroup RandomGenerator
-
-* @brief random number generator of L'Ecuyer with Bays-Durham shuffle and added safeguards (numeric recipes)
-*
-* @todo seed ist fuer die random-Funktion  nicht dokumentiert.
-*/
-
-
-
-/* note #undef's at end of file */
-/*
-#define IA 16807
-#define IM 2147483647
-#define AM (1.0/IM)
-#define IQ 127773
-#define IR 2836
-#define NTAB 32
-#define NDIV (1+(IM-1)/NTAB)
-#define EPS 1.2e-7
-#define RNMX (1.0-EPS)
-
-
-// Long period (> 2.0e18) random number generator of L'Ecuyer with
-// Bays-Durham shuffle and added safeguards.  Returns a uniform
-// random deviate between 0.0 and 1.0 (exclusive of the endpoints).
-
-float ran1(long *idum)
-{
-	int j;
-	long k;
-	static long iy=0;
-	static long iv[NTAB];
-	float temp;
-
-	if (*idum <= 0 || !iy) {
-		if (-(*idum) < 1) *idum=1;
-		else *idum = -(*idum);
-		for (j=NTAB+7;j>=0;j--) {
-			k=(*idum)/IQ;
-			*idum=IA*(*idum-k*IQ)-IR*k;
-			if (*idum < 0) *idum += IM;
-			if (j < NTAB) iv[j] = *idum;
-		}
-		iy=iv[0];
-	}
-	k=(*idum)/IQ;
-	*idum=IA*(*idum-k*IQ)-IR*k;
-	if (*idum < 0) *idum += IM;
-	j=iy/NDIV;
-	iy=iv[j];
-	iv[j] = *idum;
-	if ((temp=(float)(AM*iy)) > RNMX) return (float) RNMX;
-	else return temp;
-}
-#undef IA
-#undef IM
-#undef AM
-#undef IQ
-#undef IR
-#undef NTAB
-#undef NDIV
-#undef EPS
-#undef RNMX
-*/
-
-
-// Long period (> 2.0e18) random number generator of L'Ecuyer with
-// Bays-Durham shuffle and added safeguards.  Returns a uniform
-// random deviate between 0.0 and 1.0 (exclusive of the endpoints).
-
-#define IM1 2147483563
-#define IM2 2147483399
-#define AM (1.0/IM1)
-#define IMM1 (IM1-1)
-#define IA1 40014
-#define IA2 40692
-#define IQ1 53668
-#define IQ2 52774
-#define IR1 12211
-#define IR2 3791
-#define NTAB 32
-#define NDIV (1+IMM1/NTAB)
-#define EPS 1.2e-7
-#define RNMX (1.0-EPS)
-
-
-/**
-* @brief Long period (> 2.0e18) random number generator of L'Ecuyer with<br>
-* Bays-Durham shuffle and added safeguards.  Returns a uniform<br>
-* random deviate between 0.0 and 1.0 (exclusive of the endpoints).
-*
-* @note probably cannot be inlined because of the static variables.
-*
-* @ingroup RandomGenerator
-*/
-double ran2(long *idum)
-{
-	int j;
-	long k;
-	static long idum2=123456789;
-	static long iy=0;
-	static long iv[NTAB];
-	double temp;
-
-	if (*idum <= 0)
-	{
-		if (-(*idum) < 1)
-		*idum=1;
-		else
-		*idum = -(*idum);
-
-		idum2=(*idum);
-		for (j=NTAB+7;j>=0;j--)
-		{
-			k=(*idum)/IQ1;
-
-			*idum=IA1*(*idum-k*IQ1)-k*IR1;
-
-			if (*idum < 0) 
-				*idum += IM1;
-
-			if (j < NTAB) 
-				iv[j] = *idum;
-		}
-		iy=iv[0];
-	}
-
-	k=(*idum)/IQ1;
-	*idum=IA1*(*idum-k*IQ1)-k*IR1;
-
-	if (*idum < 0) 
-		*idum += IM1;
-
-	k=idum2/IQ2;
-	idum2=IA2*(idum2-k*IQ2)-k*IR2;
-
-	if (idum2 < 0) 
-		idum2 += IM2;
-
-	j=iy/NDIV;
-	iy=iv[j]-idum2;
-	iv[j] = *idum;
-
-	if (iy < 1) 
-		iy += IMM1;
-
-	return (temp = AM*iy) > RNMX ? RNMX : temp;
-}
-
-#undef IM1
-#undef IM2
-#undef AM
-#undef IMM1
-#undef IA1
-#undef IA2
-#undef IQ1
-#undef IQ2
-#undef IR1
-#undef IR2
-#undef NTAB
-#undef NDIV
-#undef EPS
-#undef RNMX
-
-
-
-
diff --git a/sandbox/hurwitz.kroeker/src/random.h b/sandbox/hurwitz.kroeker/src/random.h
deleted file mode 100644
index 7166ced..0000000
--- a/sandbox/hurwitz.kroeker/src/random.h
+++ /dev/null
@@ -1,231 +0,0 @@
-#ifndef RANDOM1_H
-#define RANDOM1_H
-
-
-
-
-/** @file random.h
-*
-* @ingroup RandomGenerator
-
-* @brief random number generator of L'Ecuyer with Bays-Durham shuffle and added safeguards (numeric recipes)
-*
-* @todo seed ist fuer die random-Funktion  nicht dokumentiert.
-*/
-
-#include <stdint.h>
-#include <assert.h>
-
-/* note #undef's at end of file */
-/*
-#define IA 16807
-#define IM 2147483647
-#define AM (1.0/IM)
-#define IQ 127773
-#define IR 2836
-#define NTAB 32
-#define NDIV (1+(IM-1)/NTAB)
-#define EPS 1.2e-7
-#define RNMX (1.0-EPS)
-
-
-// Long period (> 2.0e18) random number generator of L'Ecuyer with
-// Bays-Durham shuffle and added safeguards.  Returns a uniform
-// random deviate between 0.0 and 1.0 (exclusive of the endpoints).
-
-float ran1(long *idum)
-{
-	int j;
-	long k;
-	static long iy=0;
-	static long iv[NTAB];
-	float temp;
-
-	if (*idum <= 0 || !iy) {
-		if (-(*idum) < 1) *idum=1;
-		else *idum = -(*idum);
-		for (j=NTAB+7;j>=0;j--) {
-			k=(*idum)/IQ;
-			*idum=IA*(*idum-k*IQ)-IR*k;
-			if (*idum < 0) *idum += IM;
-			if (j < NTAB) iv[j] = *idum;
-		}
-		iy=iv[0];
-	}
-	k=(*idum)/IQ;
-	*idum=IA*(*idum-k*IQ)-IR*k;
-	if (*idum < 0) *idum += IM;
-	j=iy/NDIV;
-	iy=iv[j];
-	iv[j] = *idum;
-	if ((temp=(float)(AM*iy)) > RNMX) return (float) RNMX;
-	else return temp;
-}
-#undef IA
-#undef IM
-#undef AM
-#undef IQ
-#undef IR
-#undef NTAB
-#undef NDIV
-#undef EPS
-#undef RNMX
-*/
-
-
-// Long period (> 2.0e18) random number generator of L'Ecuyer with
-// Bays-Durham shuffle and added safeguards.  Returns a uniform
-// random deviate between 0.0 and 1.0 (exclusive of the endpoints).
-
-#define IM1 2147483563
-#define IM2 2147483399
-#define AM (1.0/IM1)
-#define IMM1 (IM1-1)
-#define IA1 40014
-#define IA2 40692
-#define IQ1 53668
-#define IQ2 52774
-#define IR1 12211
-#define IR2 3791
-#define NTAB 32
-#define NDIV (1+IMM1/NTAB)
-#define EPS 1.2e-7
-#define RNMX (1.0-EPS)
-
-
-/**
-* @brief Long period (> 2.0e18) random number generator of L'Ecuyer with<br>
-* Bays-Durham shuffle and added safeguards.  Returns a uniform<br>
-* random deviate between 0.0 and 1.0 (exclusive of the endpoints).
-*
-* @note probably cannot be inlined because of the static variables.
-*
-* @ingroup RandomGenerator
-*/
-double ran2(long *idum);
-
-#undef IM1
-#undef IM2
-#undef AM
-#undef IMM1
-#undef IA1
-#undef IA2
-#undef IQ1
-#undef IQ2
-#undef IR1
-#undef IR2
-#undef NTAB
-#undef NDIV
-#undef EPS
-#undef RNMX
-
-/// @todo ein Random-Objekt sollte den seed selbst speichern.
-
-/** @brief returns a random value between zero and <b>max</b>,  Long period (> 2.0e18) (see ran2())
-*
-* @ingroup RandomGenerator
-*/
-inline unsigned short random (long *seed, unsigned short max) 
-{
-	#ifdef DEBUG 
-		std::cerr << "----------- " << std::endl;
-		std::cerr << "Random call " << std::endl;
-		std::cerr << "seed "<<  *seed << std::endl;
-		std::cerr << "max "<<  max << std::endl;
-	#endif 
-	
-	//float zahl = 1.0; //Attention: float for ran1, double for ran2 !!!
-	double zahl = 1.0;
-	int counter=0;
-	while (zahl == 1.0)
-	{
-		zahl = ran2(seed);
-		counter++;
-	}
-
-	assert(counter<=1);
-	// Zahl ist zwischen 0 (eingeschl.) und 1 (ausgeschlossen)
-	zahl = zahl * (max+1);
-	// Zahl ist zwischen 0 (eingeschl.) und max+1 (ausgeschlossen)
-
-	//also muss Zahl nur noch abgerundet werden
-	#ifdef SAFE
-		assert((unsigned short)(zahl - 0.0) == (unsigned short)(zahl  ) );
-		assert((unsigned short)(zahl  )<=max );
-	#endif
-
-	#ifdef DEBUG 
-		
-		std::cerr << "random "<<  (unsigned short)(zahl - 0.0) << std::endl;
-		std::cerr << "Random call " << std::endl;
-		std::cerr << "----------- " << std::endl;
-	#endif 
-	return  (unsigned short) (zahl - 0.0);
-}
-
-
-inline uint32_t randomUInt32 (long *seed, uint32_t max) 
-{
-	#ifdef DEBUG 
-		std::cerr << "----------- " << std::endl;
-		std::cerr << "Random call " << std::endl;
-		std::cerr << "seed "<<  *seed << std::endl;
-		std::cerr << "max "<<  max << std::endl;
-	#endif 
-	
-	//float zahl = 1.0; //Attention: float for ran1, double for ran2 !!!
-	double zahl = 1.0;
-	int counter=0;
-	while (zahl == 1.0)
-	{
-		zahl = ran2(seed);
-		counter++;
-	}
-
-	assert(counter<=1);
-	// Zahl ist zwischen 0 (eingeschl.) und 1 (ausgeschlossen)
-	zahl = zahl * (max+1);
-	// Zahl ist zwischen 0 (eingeschl.) und max+1 (ausgeschlossen)
-
-	//also muss Zahl nur noch abgerundet werden
-	#ifdef SAFE
-		assert((unsigned short)(zahl - 0.0) == (unsigned short)(zahl  ) );
-		assert((unsigned short)(zahl  )<=max );
-	#endif
-
-	#ifdef DEBUG 
-		
-		std::cerr << "random "<<  (unsigned short)(zahl - 0.0) << std::endl;
-		std::cerr << "Random call " << std::endl;
-		std::cerr << "----------- " << std::endl;
-	#endif 
-	return  (uint32_t) (zahl - 0.0);
-}
-
-
-static long CF_MM_s1 = 1;
-static long CF_MM_s2 = 1;
-
-#define MODMULT(a, b, c, m, s) q = s/a; s = b*(s-a*q)-c*q; if (s < 0) s += m;
-
-static double combinedLCG(void)
-{
-    long q, z;
-
-    MODMULT(53668, 40014, 12211, 2147483563L, CF_MM_s1)
-    MODMULT(52774, 40692, 3791, 2147483399L, CF_MM_s2)
-    z = CF_MM_s1 - CF_MM_s2;
-    if (z < 1)
-        z += 2147483562;
-    return z * 4.656613e-10;
-}
-
-
-static void initLCG(long init_s1, long init_s2)
-{
-    CF_MM_s1 = init_s1;
-    CF_MM_s2 = init_s2;
-}
-
-
-#endif
diff --git a/sandbox/hurwitz.kroeker/src/rationalMapSearchForGAP.cpp b/sandbox/hurwitz.kroeker/src/rationalMapSearchForGAP.cpp
deleted file mode 100644
index c248366..0000000
--- a/sandbox/hurwitz.kroeker/src/rationalMapSearchForGAP.cpp
+++ /dev/null
@@ -1,284 +0,0 @@
-
-
-#include "hmfTypedefs.h"
-#include "HurwitzMapFinder.h"
-
-//#include "FactorPolynomialWrapper.h"
-
-#include "DebugLogger.h"
-
-
-template<class TPolynomial>
-std::ostream& printUnivarPolynomial(std::ostream& os, const TPolynomial &pol, std::string varName = std::string("a") )
-{
-    bool first=true;
-    for (size_t pos=0; pos<pol.size(); pos++)
-    {
-
-        if (not first) 
-            if ( pol[ pol.size()-1-pos ]>0)
-                os << "+" ;
-
-        if ( pos==  pol.size()-1 )
-        {
-            if (pol[pol.size()-1-pos] !=0 )
-            {
-                os << pol[ pol.size()-1-pos];        
-                first=false;
-            }
-        }
-        else
-        {
-            if ( pol[ pol.size()-1-pos ] !=0 )
-            {
-                first=false;
-
-                if (pol[ pol.size()-1-pos ] != 1 )
-                    os << pol[ pol.size()-1-pos ] ;
-                os << varName;
-                if ( pol.size()-1-pos >1)
-                    os  <<"^" << pol.size()-1-pos;
-            }
-        }
-    }
-    os << std::endl;
-    return os;
-}
-
-
-/// @todo: improve: indroduce a parameter object, which is initialized by reading an input stream and detects ill-formed input.
-void simpleCommandLineInterface(int argc, char* argv[])
-{
-
-
-    if (argc>1)
-    {        
-        std::string strFirstCmd(argv[1]);
-        if ( strFirstCmd.compare( std::string("--help") )==0 || strFirstCmd.compare( std::string("-h") )==0  )
-        {
-            std::cerr << "# input format:    "  << std::endl;
-            std::cerr << "#  flags {finite field prime}  {prime field extension degree}  {finite field mod polynomial}  {shapes: polynomial degree}  {branch value count}  {first shape} .. {last shape}   {prime field-reduced branch value approx v_4} .. v_{branch value count} "  << std::endl;
-            std::cerr << "# a shape is a list of factor exponents  separated by spaces  and terminated by '0'  "  << std::endl;
-            std::cerr << "# flags :   "  << std::endl;
-            std::cerr << "#        | 2^0 (first bit)  : debug (y/no) "  << std::endl;
-            std::cerr << "#        | 2^1 (second bit) : just count search space size"  << std::endl;
-            std::cerr << "#        | 2^2 (third bit)  : strict normalization; factors with multiplicities equal to first degree partition entries are normalized "  << std::endl;
-        
-            std::cerr << "# example for three degree 13  (43222)-Shapes  in characteristic 11 : " <<  std::endl;
-            std::cerr << "# 5  11  1   9 1   13   3   3 4 2 2 2 0    3 4 2 2 2 0     4 3 2 2 2 0 " <<  std::endl;
-   
-        }
-      }
-    bool dryRun = false;
-    bool strictNormalization=false;
-    
-    int prime = 2;
-    int extensionDegree = 1;
-    int flags = 0;
-    int debugLevel = 0;
-    unsigned int modPolDegree = 0;
-    std::vector<int>    modPolCoeffs;
-    int currCoeff = 0;
-
-
-    int branchValueCount = 0;
-    int polDegree = 0; // todo: variablennamen verbessern
-
-    std::cin >> std::ws >> flags;
-   
-    
-    if (flags & 1  )
-        debugLevel=1;
-
-    dryRun =  (flags & 2 );
-
-    strictNormalization =  (flags & 4 );
-
-
-    DebugLogger::setLevel( debugLevel );
-    
-    DebugLogger::logStream() << "#I flags :  " << flags << std::endl;
-
-    std::cin >> std::ws >> prime;
-
-    std::cin >> std::ws >> extensionDegree;
-
-    DebugLogger::logStream() << "#I debugLevel :  " << debugLevel << std::endl;
-
-    DebugLogger::logStream() << "#I dryRun :  " << dryRun << std::endl;
-
-    DebugLogger::logStream() << "#I prime :  " << prime << std::endl;
-
-    DebugLogger::logStream() << "#I extension degree  :  " << extensionDegree << std::endl;
-
-   
-
-    if ( extensionDegree != 1 )
-    {
-           DebugLogger::logStream() << "#I galois fields  are currently not suppurted" << std::endl;
-        assert(false);
-    }
- 
-    
-    //std::cin >> std::ws >> modPolDegree ;
-
-    //DebugLogger::logStream() << "#I modPolDegree :  " << modPolDegree << std::endl;
-    modPolDegree=extensionDegree;
-
-  
-    for (int currDegree=0; currDegree <= modPolDegree; currDegree++)
-    {
-              std::cin >> std::ws >> currCoeff;
-              assert( std::abs( currCoeff )<prime );
-              if (currDegree==modPolDegree)
-                assert(currCoeff != 0 );
-              modPolCoeffs.push_back(currCoeff);
-    }
-    
-    DebugLogger::logStream() << "#I modPolynomial ";
-    printUnivarPolynomial( DebugLogger::logStream(), modPolCoeffs);
-  
- 
-
-    std::cin >> std::ws >> polDegree;
-    DebugLogger::logStream() << "#I polynomial degree : " << polDegree << std::endl;
-
-   
-
-    std::cin >> std::ws >> branchValueCount;
-
-    DebugLogger::logStream() << "#I branchValueCount = " << branchValueCount << std::endl;
-
-    std::vector< RationalMapSearch::Shape >  shapeList;
-
-     std::vector< int  >  normalizationExponents;
-
-    for (int currShapePos=0; currShapePos< branchValueCount; currShapePos++)
-    {
-        std::vector<int>    partition;
-        int exponent=0;
-        int expSum=0;
-        do
-        {
-              std::cin >> std::ws >> exponent;
-              if (exponent!=0)
-                partition.push_back(exponent);
-              expSum += exponent;
-            assert( expSum<=polDegree );
-        }
-        while (exponent !=0 );
-        assert( expSum==polDegree );
-
-        if ( currShapePos<3)
-        {
-            assert( partition.size()>0 );
-            if (strictNormalization)
-                normalizationExponents.push_back( partition[0] );
-            else
-                normalizationExponents.push_back( RationalMapSearch::NormalizationRule::dontcare );
-        }
-        
-         RationalMapSearch::Shape shape =  RationalMapSearch::Shape(partition);
-         DebugLogger::logStream() << "#I shape [" << currShapePos << "] :"  << shape << std::endl;
-
-        shapeList.push_back( shape );
-    }
-    DebugLogger::logStream() << "#I shapeList constructed  " << std::endl;
-
-    if (strictNormalization)
-    {
-        DebugLogger::logStream() << "#I strictNormalization  " << std::endl;
-         DebugLogger::logStream() << "#I normalize factors with multiplicities ";
-        for (size_t pos=0;pos< normalizationExponents.size();pos++)
-        {
-            if (pos>0) 
-                 DebugLogger::logStream() << ",";
-            DebugLogger::logStream() << normalizationExponents[pos] << " ";
-        }
-        DebugLogger::logStream()  << std::endl;
-    }
-     
-
- 
-    std::vector <int > reducedBranchValues;
- 
-    for (int currShapePos=3; currShapePos< branchValueCount; currShapePos++)
-    {
-            RationalMapSearch::HMSProblem::PolynomRepType     minimalPolynomial;
-            int reducedBranchValue = 1;
-            std::cin >> std::ws >> reducedBranchValue;
-            reducedBranchValues.push_back(reducedBranchValue);
-    }
-    
-  //////////////////////////
-  
-
-
-    bool  logStructure;
-
-    const  RationalMapSearch::SearchOptions   searchOptions= 
-                                            RationalMapSearch::SearchOptions( dryRun, 
-                                                                              logStructure=false,     
-                                                                              strictNormalization, 
-                                                                              RationalMapSearch::OutputMode::GAPOutput );
-    
-    RationalMapSearch::HurwitzMapFinder    hmf;         
-                                                        
-    // gehoert 'prime' zu SearchOptions oder nicht? Eigentlich schon, aber dann auch der modPol, generator und extensionDegree.
-
-    if (extensionDegree==1)
-    {
-        assert( modPolCoeffs.size()==2 );
-
-        
-        const  TPolRingType::RingType* field = new   TPolRingType::RingType(prime,0, prime - modPolCoeffs[0] % prime );
-        const   TPolRingType * ring = new TPolRingType(*field);
-
-       std::vector <    RationalMapSearch::HMSProblem::PolynomRepType  > minimalPolynomials;
-
-        for (int currReducedBranchValuePos=0; currReducedBranchValuePos< reducedBranchValues.size() ; currReducedBranchValuePos++)
-            {
-                    RationalMapSearch::HMSProblem::PolynomRepType     minimalPolynomial;
-                    assert(   reducedBranchValues[currReducedBranchValuePos] < field->getCardinality() &&  reducedBranchValues[currReducedBranchValuePos] >0 );
-                    // set minimal polynomial to 'x-reducedBranchPoint';
-                    DebugLogger::logStream() << "#I reduced branch value no " << currReducedBranchValuePos+4 << " : " << reducedBranchValues[currReducedBranchValuePos] << std::endl;
-        
-                    assert( extensionDegree == 1 ); //for extension field this part differs.
-                    int fieldElement=field->generatorExponentToElem( reducedBranchValues[currReducedBranchValuePos] );
-                    assert( std::abs( fieldElement ) < field->getCardinality() );
-                    DebugLogger::logStream() << "# reduced branch value  fieldelem  = " << fieldElement << std::endl;
-                    minimalPolynomial.push_back( - fieldElement );
-                    minimalPolynomial.push_back(1);
-                    minimalPolynomials.push_back( minimalPolynomial );
-            }
-
-        assert (normalizationExponents.size()==3 );
-        RationalMapSearch::NormalizationRule infinity = RationalMapSearch::NormalizationRule(0, normalizationExponents[0], RationalMapSearch::NormalizationValue::infinity );
-        RationalMapSearch::NormalizationRule zero = RationalMapSearch::NormalizationRule(1, normalizationExponents[1], RationalMapSearch::NormalizationValue::zero);
-        RationalMapSearch::NormalizationRule one = RationalMapSearch::NormalizationRule(2, normalizationExponents[2], RationalMapSearch::NormalizationValue::one);
-
-        //std::vector <RationalMapSearch::NormalizationRule> preRuleList =  {infinity,zero,one};
-        std::vector <RationalMapSearch::NormalizationRule> preRuleList ;
-        preRuleList.push_back(infinity);preRuleList.push_back(zero);preRuleList.push_back(one);
-        RationalMapSearch::NormalizationRuleList nrl= RationalMapSearch::NormalizationRuleList(preRuleList, strictNormalization);
-
-        RationalMapSearch::HMSProblem  hurwitzMapSearchProblem( shapeList,nrl, minimalPolynomials );
-
-        hmf.finiteFieldSearch(hurwitzMapSearchProblem, searchOptions, *ring );  
-    }
-    else
-        assert(false);
-
-
-    return;
-}
-
-
-/// test 5 11 1   9 1  3 4 2 1 0  2 1 0 2 1 0 2 1 0 2 1 0
-
-int main(int argc, char* argv[])
-{
-    simpleCommandLineInterface(argc, argv);
-
-    return 0;
-}
diff --git a/sandbox/hurwitz.kroeker/src/timer.C b/sandbox/hurwitz.kroeker/src/timer.C
deleted file mode 100644
index 1e3f9de..0000000
--- a/sandbox/hurwitz.kroeker/src/timer.C
+++ /dev/null
@@ -1,261 +0,0 @@
-/* -*- mode: C++; tab-width: 8; indent-tabs-mode: t; c-basic-offset: 8 -*- */
-
-/** \file timer.C @brief  A %timer. Copyright (C) 1994-1997 Givaro Team
- * 
- * A %timer. Copyright (C) 1994-1997 Givaro Team
- *
- * Written by T. Gautier
- *
- * This library is free software; you can redistribute it and/or
- * modify it under the terms of the GNU Lesser General Public
- * License as published by the Free Software Foundation; either
- * version 2 of the License, or (at your option) any later version.
- *
- * This library is distributed in the hope that it will be useful,
- * but WITHOUT ANY WARRANTY; without even the implied warranty of
- * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.	 See the GNU
- * Lesser General Public License for more details.
- *
- * You should have received a copy of the GNU Lesser General Public
- * License along with this library; if not, write to the
- * Free Software Foundation, Inc., 59 Temple Place - Suite 330,
- * Boston, MA 02111-1307, USA.
- *
- * This file implements the C++ interface to commentators (for 
- * providing runtime commentary to the user)
-*
-* @ingroup Timer
- */
-#ifndef __LINBOX__TIMER__C__
-#define __LINBOX__TIMER__C__
-// Description:
-// - various timer objects
-// - to be rewritten to be more efficient
-
-#include <cmath>
-
-extern "C" {
-# include <sys/time.h>
-# include <sys/resource.h>
-//  int getrusage (int, struct rusage*) ;
-}
-
-#include <iostream>
-
-#include <assert.h>
-
-#include "timer.h"
-
-/// Return a value to initialize random generator 
-long BaseTimer::seed() 
-{
-	struct timeval tp;
-	gettimeofday(&tp, 0) ;
-	return(tp.tv_usec);
-}
-
-/// Output the value of the timer :
-std::ostream& BaseTimer::print( std::ostream& o ) const 
-{ return o << _t ; }
-
-/// Some arithmetic operator :
-BaseTimer& BaseTimer::operator = (const BaseTimer & T) 
-{  
-	_t = T._t ; 
-	return *this ; 
-}
-      
-/// Computes and returns interval of time beteween *this and T
-const BaseTimer BaseTimer::operator - (const BaseTimer & T) const
-{
-	BaseTimer Tmp ;
-	Tmp._t = _t - T._t ; 
-	return Tmp ;
-}
-
-const BaseTimer BaseTimer::operator - () 
-{
-	BaseTimer Tmp ;
-	Tmp._t = -_t ; 
-	return Tmp ;
-}
-
-const BaseTimer BaseTimer::operator + (const BaseTimer & T)  const
-{
-	BaseTimer Tmp ;
-	Tmp._t = _t + T._t ; 
-	return Tmp ;
-}
-
-/// Start timer
-void RealTimer::start()
-{  
-	struct timeval tmp2 ; 
-	gettimeofday (&tmp2, 0) ;
-
-	// real time 
-	_start_t = (double) tmp2.tv_sec + 
-		((double) tmp2.tv_usec)/ (double)BaseTimer::MSPSEC ; 
-}
-
-
-/// Stop timer 
-/// @pre: start was called.
-void RealTimer::stop()
-{ 
-	struct timeval tmp2 ;  
-	gettimeofday (&tmp2, 0) ;
-
-	// real time 
-	_t += (double) tmp2.tv_sec + 
-		((double) tmp2.tv_usec)/ (double)BaseTimer::MSPSEC - _start_t ; 
-}
-
-/// Start timer
-void UserTimer::start()
-{
-	struct rusage  tmp1 ;  // to getrusage (sys+user times)
-	getrusage (RUSAGE_SELF, &tmp1) ;
-	// user time
-	_start_t = (double) tmp1.ru_utime.tv_sec +
-		((double) tmp1.ru_utime.tv_usec)/ (double)MSPSEC ;
-}
-
-
-/// Stop timer
-/// @pre: start was called.
-void UserTimer::stop()
-{
-	struct rusage  tmp1 ;  // to getrusage (sys+user times)
-	getrusage (RUSAGE_SELF, &tmp1) ;
-	// user time
-	_t += (double) tmp1.ru_utime.tv_sec +
-		((double) tmp1.ru_utime.tv_usec)/ (double)MSPSEC - _start_t ;
-}
-
-
-/// Start timer
-void SysTimer::start()
-{
-	struct rusage  tmp1 ;  // to getrusage (sys+user times)
-	getrusage (RUSAGE_SELF, &tmp1) ;
-	// user time
-	_start_t = (double) tmp1.ru_stime.tv_sec + 
-		((double) tmp1.ru_stime.tv_usec)/ (double)MSPSEC ;
-}
-
-
-/// Stop timer
-/// @pre: start was called.
-void SysTimer::stop()
-{
-	struct rusage  tmp1 ;  // to getrusage (sys+user times)
-	getrusage (RUSAGE_SELF, &tmp1) ;
-	// user time
-	_t += (double) tmp1.ru_stime.tv_sec +
-		((double) tmp1.ru_stime.tv_usec)/ (double)MSPSEC - _start_t ;
-}
-
-
-
-/// Clear timer :
-void Timer::clear() 
-{ rt.clear() ; ut.clear(); st.clear(); _count = 0; 	b_IsRunning=false; b_Paused=false; }
-
-/// Start timer
-void Timer::start() 
-{
-	assert(!b_IsRunning || (b_IsRunning && b_Paused )); 
-	if (!b_IsRunning || (b_IsRunning && b_Paused )) 
-	{
-		b_IsRunning=true; rt.start() ; ut.start(); st.start(); _count = 0; 
-	} 
-}
-
-void Timer::continueTimer() 
-{ 
-	#ifdef CF_TEST
-		assert ( b_Paused ) ;
-	#endif
-	if (b_Paused) 
-	{ 
-		if (b_IsRunning) 
-		{
-			 rt.start() ; ut.start(); st.start(); _count = 0;  
-		} 
-		b_Paused=false; 
-	} 
-}
-
-/// Stop timer
-void Timer::stop() 
-{ 
-	#ifdef CF_TEST
-		assert ( !b_Paused && b_IsRunning) ;
-	#endif
-
-	assert ( !b_Paused ) ;
-	
-	if (b_IsRunning)
-	{
-		 rt.stop() ; ut.stop(); st.stop(); _count = 1;   b_IsRunning=false; 
-	} 
-}
-
-void Timer::pauseTimer() 
-{ 
-	b_Paused=true; 
-	if (b_IsRunning) { rt.stop() ; ut.stop(); st.stop(); _count = 1; }   
-}
-
-
-std::ostream& Timer::print( std::ostream& o ) const
-{
-	o << "user time: " << usertime() << '\n' ;
-	o << "sys. time: " << systime() << '\n' ;
-	return o << "real time: " << realtime() << std::endl ;
-}
-
-/// Some arithmetic operator :
-Timer& Timer::operator = (const Timer & T)
-{
-	ut = T.ut ; 
-	st = T.st ; 
-	rt = T.rt ;
-	_count = T._count;
-	return *this ;
-}
-
-/// Comput._tes and returns interval of time beteween *this and T
-const Timer Timer::operator - (const Timer & T)  const
-{
-	Timer Tmp ;
-	Tmp.ut = ut - T.ut ;
-	Tmp.st = st - T.st ;
-	Tmp.rt = rt - T.rt ;
-	Tmp._count = _count - T._count;
-	return Tmp ;
-}
-
-const Timer Timer::operator - ()
-{
-	Timer Tmp ;
-	Tmp.ut = -ut ;
-	Tmp.st = -st ;
-	Tmp.rt = -rt ;
-	Tmp._count = - _count;
-	return Tmp ;
-}
-
-const Timer Timer::operator + (const Timer & T)  const
-{
-	Timer Tmp ;
-	Tmp.ut = ut + T.ut ;
-	Tmp.st = st + T.st ;
-	Tmp.rt = rt + T.rt ;
-	Tmp._count = _count + T._count;
-	return Tmp ;
-}
- 
-
-#endif
diff --git a/sandbox/hurwitz.kroeker/src/timer.h b/sandbox/hurwitz.kroeker/src/timer.h
deleted file mode 100644
index 4367ee9..0000000
--- a/sandbox/hurwitz.kroeker/src/timer.h
+++ /dev/null
@@ -1,198 +0,0 @@
-/* -*- mode: C++; tab-width: 8; indent-tabs-mode: t; c-basic-offset: 8 -*- */
-
-/**
-@defgroup Timer
-*/
-
-
-/** \file timer.h
- *
- * @brief  A %timer.  Copyright (C) 1994-1997 Givaro Team
- * 
- * Copyright (C) 1994-1997 Givaro Team
- *
- * Written by T. Gautier
- *
- * ------------------------------------
- * Modified by Bradford Hovinen <hovinen@cis.udel.edu>
- *
- * Modified by Jakob Kroeker <kroeker@uni-math.gwdg.de>
- * 
- * Added _start_t member to BaseTimer, so that stop () does not clobber the
- * class' memory of its start time. This allows it to be called repeatedly to
- * get elapsed times.
- * ------------------------------------
- * Modified by Clement Pernet
- * integrated into FFLAS_FFPACK
- *
- * ------------------------------------
- * See COPYING for license information.
- *
- * This file implements the C++ interface to commentators (for 
- * providing runtime commentary to the user)
-*
-* @ingroup Timer
- */
-
-#ifndef __TIMER_H
-#define __TIMER_H
-
-#include <iostream>
-#include <string>
-//#include "MtcpCheckpointManager.h"
-
-///   Copyright (C) 1994-1997 Givaro Team
-class BaseTimer { 
-    public:
-	enum { 
-		MSPSEC = 1000000  ///< microsecond per second
-	};
-
-	// todo: welche Konsequenzen hat es, _start_t mit 0 zu initialisieren?
-	inline BaseTimer():_start_t(0)  { clear(); };
-
-	/// -- Clear timer :
-	inline void clear() { _t = 0;  }
-
-	/// -- total amount of second spent 
-	inline double time() const { return _t; }
-
-	/// -- Return a value to initialize random generator
-	static long seed();
-
-	/// -- basic methods:
-	std::ostream &print (std::ostream &) const;
-       
-	/** @name operators
-	* @{ */
-		// -- Some arithmetic operators to compute cumulative time :
-		BaseTimer& operator = (const BaseTimer & T) ;
-		const BaseTimer operator - (const BaseTimer & T)  const;
-		const BaseTimer operator - () ;
-		const BaseTimer operator +  (const BaseTimer & T)  const;
-		BaseTimer& operator += (const BaseTimer & T) { return *this = *this + T; };
-		BaseTimer& operator -= (const BaseTimer & T) { return *this = *this - T; };
-	/** @} */
-
-    public:
-	double _start_t;  ///< time as of start ()
-	double _t;        ///< time  
-
-};
-
-inline std::ostream &operator << (std::ostream &o, const BaseTimer &BT)
-	{ return BT.print(o); }
-
-class RealTimer : public BaseTimer {
-    public:
-	inline RealTimer (const BaseTimer &BT) : BaseTimer (BT) {  };
-	inline RealTimer () {  };
-	void start ();
-	void stop ();
-};
-
-
-class UserTimer : public BaseTimer {
-    public:
-	inline UserTimer (const BaseTimer &BT) : BaseTimer (BT) {};
-	inline UserTimer () { };
-	void start ();
-	void stop ();
-};
-
-
-class SysTimer : public BaseTimer {
-    public:
-	inline SysTimer (const BaseTimer &BT): BaseTimer (BT) {};
-	inline SysTimer () { };
-	void start ();
-	void stop ();
-};
-
-///   a timer, copyright (C) 1994-1997 Givaro Team; License: LGPL 
-class Timer {
-
-	friend class MtcpCheckpointManager;
-    public :
-
-	inline Timer () { clear(); };
-
-
-	/// Clear timer :
-	void clear(); 
-
-	/// Start timer
-	void start ();
-
-	/// Stop timer 
-	void stop ();
-
-	/// pause timer
-	void pauseTimer ();
-
-	/// continie timer // if timer is not running, not
-	void continueTimer ();
-
-	/// total amount of second spent in user mode
-	double usertime () const { return ut.time(); }
-
-	/// total amount of second spent in system mode
-	double systime () const { return st.time(); }
-
-	/// real total amount of second spent.  
-	double realtime () const { return rt.time(); }
-
-	// retourne une petite graine
-	// long seed() const { return RealTimer::seed(); }
-	/** @name operators
-	@{ */
-		// Some arithmetic operators to compute cumulative time :
-		Timer& operator = (const Timer & T) ;
-		const Timer operator - (const Timer & T)  const;
-		const Timer operator - () ;
-		const Timer operator + (const Timer & T)  const;
-		Timer& operator += (const Timer & T) { return *this = *this + T; };
-		Timer& operator -= (const Timer & T) { return *this = *this - T; };
-	/** @{ */
-	// -- methods :
-	std::ostream &print (std::ostream &) const;
-
-	size_t count() const {return _count;}
-
-    private:
-	size_t _count; // how many 
-
-	RealTimer rt;
-	UserTimer ut;
-	SysTimer  st;
-
-	/** @name timer state
-	@{ */
-		bool b_IsRunning; 
-		bool b_Paused;
-	/** @{ */
-};
-
-// inline std::ostream &operator << (std::ostream &o, const Timer &T)
-// 	{ return T.print (o); }
-
-inline std::ostream &operator << (std::ostream &o, const Timer &T)
-{ 
-	double ut = T.usertime();
-	if (ut < 0.0000000001) ut = 0;
-	return o << T.realtime() << "s (" << ut << " cpu) [" << T.count() << "]"; }
- 
-
-
-
-inline void outputTimerInfoEx(std::ostream & os, Timer &tim, std::string ostring)
-{	
-	os << ostring << " : " << tim.usertime() << " sec." << std::endl;
-}
-
-
-
-
-//#include "timer.C"
-
-#endif 
diff --git a/sandbox/hurwitz.kroeker/src/typedefs.h b/sandbox/hurwitz.kroeker/src/typedefs.h
deleted file mode 100644
index 7c8766c..0000000
--- a/sandbox/hurwitz.kroeker/src/typedefs.h
+++ /dev/null
@@ -1,36 +0,0 @@
-#ifndef TYPEDEFS_H
-#define TYPEDEFS_H
-
-
-/** @file typedefs.h 
-*
-*   @brief Contains \b  ulong64 and \b  long64 typedefs for Windows and Linux environment
-           and P_or_QPolynom-enum.
-*
-* @todo P_or_QPolynom definition does not belong here!
-*/
-
-
-#if defined(_MSC_VER) || defined(__BORLANDC__)
-
-	typedef unsigned __int64 ulong64;
-
-	typedef   signed __int64  long64;
-
-#else   //Linux-Environment:
-
-	typedef unsigned long long ulong64;
-
-	typedef signed long long  long64;
-
-	typedef short scalarType;
-
-	typedef short scalarType;
-
-	typedef short epsScalarType;
-	
-#endif
-
-
-
-#endif
diff --git a/sandbox/hurwitz.kroeker/src/xyMonom.cc b/sandbox/hurwitz.kroeker/src/xyMonom.cc
deleted file mode 100644
index 61168de..0000000
--- a/sandbox/hurwitz.kroeker/src/xyMonom.cc
+++ /dev/null
@@ -1,131 +0,0 @@
-
-#include "xyMonom.h"
-#include "parseTools.h"
-
-
-
-using namespace std;
-
-
-/** @brief reads a number from input stream (an exponent)
- is only for the case when in a input stream '^' was read - as next an exponent number is expected and
-*/
-unsigned int xyExpPair::extractExplicitExponent(stringstream&  sstream)
-{
-	string res="";
-	
-	int num=0;
-	int sign=getSign(sstream);
-
-	if (sign<0)
-	{
-		throw "negative exponents not allowed fom monoms! " ;
-	}
-
-	sstream >> ws;
-	sstream >>num;
-	if (sstream.fail())
-	{
-		throw "no exponent given" ;
-	}
-	return num;
-}
-
-
-
-
-
-/** @brief liest die Exponenten der Variablen (x,y).
- Nur positive Exponenten erlaubt.<br>
-
- Erlaubt ist also so etwas wie 'x' , 'y' , 'xy' 'x^2y 'xy^3' 'x*y'
- 'x^2*y^5' aber nicht 'x^-1'!
- wenn x oder y, dann entweder ^oder + erlaubt
- einschränken: wenn *, dann nur noch x oder y erlaubt.
-*/
-xyExpPair::xyExpPair(std::stringstream&  sstream)
-{
-	#ifdef DEBUG
-		std::cerr << "create xyExpPair" << std::endl;
-		std::cerr << "xyExpPair stream: =" << sstream.str() << std::endl;
-	#endif
-
-	assert (!sstream.fail());
-
-	x_exp=0;
-	y_exp=0;
-
-	char a;	
-	bool isXExp=false;
-	bool isYExp=false;
-
-	sstream >> ws;
-	
-	while (!sstream.eof() )
-	{
-		assert (!sstream.fail());
-		a=sstream.peek();
-		#ifdef DEBUG
-			std::cerr << "a " << a;
-		#endif
-		if (a=='*')
-		{
-			isXExp=false;
-			isYExp=false;
-			sstream >>a;
-			sstream >> ws;
-			continue;
-		}
-		if (a=='x')
-		{
-			x_exp=1; // der x-Exponent ist implizit  mindestens 1 , wenn kein '^' folgt
-			isXExp=true;
-			isYExp=false;
-			sstream >>a;
-			sstream >> ws;
-			continue;
-		}
-		else 
-		if (a=='y')
-		{
-
-			y_exp=1; // der y-Exponent ist implizit mindestens 1, wenn kein '^' folgt
-			isYExp=true;
-			isXExp=false;
-			sstream >>a;
-			sstream >> ws;
-			continue;
-		}
-		else
-		if (a=='^')
-		{
-			sstream >>a;
-			if (isXExp)	
-			{
-				x_exp=extractExplicitExponent(sstream);
-				//assert(x_exp!=0);  - kann auch 0 sein!
-			}
-			else if (isYExp)
-			{
-				y_exp=extractExplicitExponent(sstream);
-				//assert(y_exp!=0);
-			}
-			else throw "[xy]-polynom: unknown variable";
-			sstream >> ws;
-			continue;
-		}
-		else 
-		{
-			sstream >> ws;
-			if (sstream.eof() || a=='-' || a =='+' )		
-				return;
-			else
-			{
-				throw "error during extracting (x,y) exponents";
-			}
-		}
-	}
-}
-
-
-
diff --git a/sandbox/hurwitz.kroeker/src/xyMonom.h b/sandbox/hurwitz.kroeker/src/xyMonom.h
deleted file mode 100644
index cc48060..0000000
--- a/sandbox/hurwitz.kroeker/src/xyMonom.h
+++ /dev/null
@@ -1,765 +0,0 @@
-
-#pragma once
-
-#include <sstream>
-#include <assert.h>
-#include <iostream>
-#include <algorithm>
-
-#include "parseTools.h"
-
-/** @file xyMonom.h 
-*
-*   @brief contains contains xyExpPair and xyMonom -  monom template representation in two variables 
-*
-*/
-
-/// exponents of monom in (x,y)-> negative exponets not allowed!
-struct xyExpPair
-{
-	/** @name Constructors
- 	@{ */
-		inline xyExpPair();
-
-		inline xyExpPair( int _x_exp,  int _y_exp );
-
-		xyExpPair(std::stringstream&  sstream);
-
-	/** @} */
-
-	/** @name Access to Exponents
- 	@{ */
-	
-		inline void 		set( int _x_exp,  int _y_exp);
-		inline unsigned int 	getXExp() 	const;
-		inline unsigned int 	getYExp() 	const;
-		
-		/// returns ( x_exp + y_exp )
-		inline unsigned int 	getDegree() const;
-
-	/** @} */
-
-	protected:
-		unsigned int 	x_exp; ///< x - exponent 
-		unsigned int 	y_exp; ///< y - exponent 
-
-		unsigned int 	extractExplicitExponent(std::stringstream&  sstream);
-};
-
-
-
-
-/** @brief Represents a  monom template in two variables. Therefore negative exponents are not allowed
-*
-*/
-template <class ccoeff>
-struct xyMonom
-{
-
-	/** @name Constructors
- 	@{ */
-		xyMonom();
-
-		xyMonom(ccoeff _coeff, int _x_exp, int _y_exp );
-	
-		/// constructs a monom from a input stringstream , see detailed description for format
-		xyMonom(std::stringstream&  sstream);
-
-		xyMonom(std::string str);
-	/** @} */
-
-
-	void createFromStream(std::stringstream&  monomListStream);
-
-	/** @name Monom exponent access
- 	@{ */
-		inline unsigned int 	getDegree() const;
-		
-		inline unsigned int	getXExp() 	const;
-		inline unsigned int 	getYExp() 	const;
-		inline void 		setExp(int _x_exp, int _y_exp);
-	/** @} */
-
-	/** @name Monom coefficient access
- 	@{ */
-		inline ccoeff 	getCoeff() const;
-		inline void 	setCoeff(ccoeff _coeff);
-	/** @} */
-
-	/** @name evaluate xyMonom 
- 	@{ */
-		template <class IMultiplyCoeffWithVariable, class IMultiplyVariables, class ResultType >
-		inline ResultType 	substitute(	const typename IMultiplyVariables::ElementType & x, 
-								const typename IMultiplyVariables::ElementType & y,
-								 const IMultiplyCoeffWithVariable & imultCoeffXVariable,
-								 const IMultiplyVariables & imultVariableXVariable
-							 ) const;
-
-		template <class IMultiplyRing >
-		typename IMultiplyRing::ElementType substitute2(			
-								const typename IMultiplyRing::ElementType 		& x, 
-								const typename IMultiplyRing::ElementType 		& y,
-								const 	IMultiplyRing	 				& imult
-							 ) const;
-
-	/** @} */
-
-	protected:
-		ccoeff 		coeff;	///< monom coeffitient
-	
-		xyExpPair 	exponents;///< monom exponents of x and y
-	
-		std::string 	monomString; ///< monom-representing string
-
-};
-
-
-
-
-
-
-template <class ccoeff>
-std::ostream &  operator<<(std::ostream & out, const xyMonom<ccoeff>& xyMonomObj);
-
-/// @todo Problem: Klammer kann noch nicht eingelesen werden. sollte auch nicht ausgegeben werden. 
-/// Nachteil: Ohne Klammerverwendung ist die Lesbarkeit nicht gut.
-/// @todo Herausfinden, wo es ein Problem bei der Ausgabe geben kann, wenn nicht geklammert wird.
-template <class ccoeff>
-std::ostream &  operator<<(std::ostream & out, const xyMonom<ccoeff>& xyMonomObj)
-{  
-	//out << xyMonomObj.getCoeff() << "*x^" << xyMonomObj.getXExp() << "*y^" << xyMonomObj.getYExp() << std::endl ;
-	xyMonomObj.getCoeff().printMultSecure(out);
-	out  << "*x^" << xyMonomObj.getXExp() << "*y^" << xyMonomObj.getYExp() << std::endl ;
-	return out;
-} ;
-
-
-
-
-
-
-inline xyExpPair::xyExpPair()
-{
-	x_exp=0;
-	y_exp=0;
-}
-
-inline xyExpPair::xyExpPair(int _x_exp, int _y_exp )
-{
-	assert(_x_exp>=0 && _y_exp>=0);
-
-	x_exp=_x_exp;
-	y_exp=_y_exp;
-}
-
-inline void xyExpPair::set(int _x_exp, int _y_exp )
-{
-	assert(_x_exp>=0 &&_y_exp>=0);
-	x_exp=_x_exp;
-	y_exp=_y_exp;
-}
-
-inline unsigned int xyExpPair::getDegree() const 
-{
-	return x_exp + y_exp;
-}
-
-inline unsigned int xyExpPair::getXExp() const 
-{
-	return x_exp ;
-}
-
-inline unsigned int xyExpPair::getYExp() const 
-{
-	return y_exp ;
-}
-
-
-
-
-
-
-template <class ccoeff>
-xyMonom<ccoeff>::xyMonom()
-{
-	exponents.set(0,0);
-	coeff=0;
-};
-
-template <class ccoeff>
-inline unsigned int xyMonom<ccoeff>::getDegree() const
-{
-	return exponents.getDegree();
-}
-
-
-template <class ccoeff>
-inline unsigned int xyMonom<ccoeff>::getXExp() const 
-{
-	return exponents.getXExp() ;
-}
-
-
-
-template <class ccoeff>
-inline unsigned int xyMonom<ccoeff>::getYExp() const 
-{
-	return exponents.getYExp() ;
-}
-
-
-
-template <class ccoeff>
-inline ccoeff xyMonom<ccoeff>::getCoeff() const 
-{
-	return coeff;
-}
-
-template <class ccoeff>
-inline void  xyMonom<ccoeff>::setExp(int _x_exp, int _y_exp)
-{
-	assert(_x_exp>=0 && _y_exp>=0);
-	exponents.set(_x_exp,_y_exp);
-}
-
-template <class ccoeff>
-inline void xyMonom<ccoeff>::setCoeff(ccoeff _coeff)
-{
-	coeff=_coeff;
-}
-
-template <class ccoeff>
-void xyMonom<ccoeff>::createFromStream(std::stringstream&  monomListStream)
-{
-	#ifdef DEBUG
-		std::cerr << "xyMonom:: " << std::endl;
-		std::cerr << "monomListStream= '" << monomListStream.str() << "'";
-	#endif
-	ccoeff parsedCoeff;
-	bool failed = false;
-
-	std::streampos pos = monomListStream.tellp ( );
-	
-	bool negative = false;
-
-	// eigentlich muss man sich bis x oder y vorarbeiten. dann ist dieser Teil der Koeffizient.
-	// Wenn es nur ein '+' oder ein '-' ist, den Koeffizienten mit 1 oder -1 initialisieren. 
-	try{
-		#ifdef DEBUG
-			std::cerr << std::endl <<"parsedCoeff = ccoeff(monomListStream);" << std::endl;
-		#endif
-		monomListStream.peek();
-		assert( monomListStream.good() );
-		if (monomListStream.peek()=='-')
-		{
-			negative=true;
-			extractChar('-',monomListStream);
-		}
-		monomListStream.peek();
-
-		if ( !monomListStream.eof() )
-		{
-			parsedCoeff = ccoeff(monomListStream);
-	
-			if (monomListStream.fail() )
-			{
-				// hilft alles nix!
-				monomListStream.clear();
-				//std::cerr   <<"pos  "<< pos << std::endl;
-				monomListStream.seekp(pos);
-				assert(! monomListStream.eof() );
-			
-				failed = true;
-				throw "failed to get the monom coefficient";
-			}
-		}
-		else
-		{
-			parsedCoeff=-1;
-			negative=false;
-		}
-
-	}
-	catch(char const * error)
-	{
-		// hier muss noch geprueft werden, ob ein 
-		#ifdef DEBUG
-			std::cerr << "char const * error: failed=true" << std::endl;
-		#endif
-		failed = true;
-	}
-	catch(std::bad_exception &e) 
-	{
-		// hier muss noch geprueft werden, ob ein 
-		#ifdef DEBUG
-			std::cerr << "bad_exception: failed=true" << std::endl;
-		#endif
-		failed = true;
-	}
-	catch(...)
-	{
-		// hier muss noch geprueft werden, ob ein 
-		#ifdef DEBUG
-			std::cerr << "exception (...) : failed=true" << std::endl;
-		#endif
-		failed = true;
-	}
-	if (failed)
-	{
-
-		#ifdef DEBUG
-		std::cerr << " xyMonom: get coeff from stream failed" << std::endl;
-		#endif
-	
-		//std::cerr << "monomListStream" <<  monomListStream.str() << std::endl;
-		assert(! monomListStream.eof() );
-		assert(! monomListStream.fail() );
-		assert(! monomListStream.bad() );
-		assert( monomListStream.good() );
-		monomListStream.seekp(pos);	// hilft alles nix!
-		//std::cerr << " monomListStream.peek()" <<  (char)monomListStream.peek() << "'" << std::endl;
-		if (!monomListStream.eof() && (monomListStream.peek()=='x' || monomListStream.peek()=='y' ||  monomListStream.peek()=='-') )
-		{
-			#ifdef DEBUG
-				std::cerr << "parsedCoeff=1;"<< std::endl;
-			#endif
-			parsedCoeff=1;
-			if (monomListStream.peek()=='-')
-			{
-				parsedCoeff=-1;
-				extractChar('-',monomListStream);
-			}
-		}
-		else
-			throw "failed to get  monom coefficient";
-	}
-
-	coeff = parsedCoeff;
-
-	if (negative)
-	{
-		coeff= -parsedCoeff;
-	}
-	
-	#ifdef DEBUG	
-		std::cerr << "monomListStream= '" << monomListStream.str() << "'";
-	#endif
-	
-	xyExpPair parsedxyExpPair(monomListStream);
-
-	exponents = parsedxyExpPair;
-}
-
-
-template <class ccoeff>
-xyMonom<ccoeff>::xyMonom(std::string   monom )
-{
-	std::stringstream monomstrstream(monom);
-
-	createFromStream(monomstrstream);
-}
-
-
-
-
-/**  @brief reads xy-monom from input stream. <br>
-/// For coefficient format conventions see class ccoeff and <br>
-/// for variable exponent format conventions xyExpPair(stringtream)
-@pre: coeff kann negiert werden (implementiert den 'operator-'
-*/
-template <class ccoeff>
-xyMonom<ccoeff>::xyMonom(std::stringstream&  monomListStream)
-{
-	createFromStream(monomListStream);
-};
-
-
-
-template <class ccoeff>
-xyMonom<ccoeff>::xyMonom(ccoeff _coeff, int _x_exp, int _y_exp )
-{
-	coeff=_coeff;
-	exponents.set(_x_exp,_y_exp);
-}
-
-
-/// @todo strenggenommen müsste das Zwischenergebnis immer wissen, zu welchem Ring es gehört. Dies ist aber nicht
-/// optimierungsfreundlich 
-template <class ccoeff>
-template <class IMultiplyCoeffWithVariable, class IMultiplyVariables, class ResultType >
-ResultType 	xyMonom<ccoeff>::substitute(			
-								const typename IMultiplyVariables::ElementType 		& x, 
-								const typename IMultiplyVariables::ElementType 		& y,
-								const 	IMultiplyCoeffWithVariable 			& imultCoeffXVariable,
-								const 	IMultiplyVariables 				& imultVariableXVariable
-							 ) const
-{
-
-	//assert()
-
-	typename IMultiplyVariables::MultiplicationResultType	res=	IMultiplyVariables::ElementType::One;
-
-	for (int currXexp=1;	currXexp<=(int)exponents.getXExp(); currXexp++)
-	{
-		res	=	imultVariableXVariable.multiply(res,x);
-	}
-
-	for (int currYexp=1;	currYexp<=(int)exponents.getYExp(); currYexp++)
-	{
-		res	=	imultVariableXVariable.multiply(res,y);
-	}
-
-	for (int currXexp=-1;	currXexp>=exponents.getXExp(); currXexp--)
-	{
-		res	=	imultVariableXVariable.multiply(res, imultVariableXVariable.multInv(x) );
-	}
-
-	for (int currYexp=-1;	currYexp>=exponents.getYExp(); currYexp--)
-	{
-		res	=	imultVariableXVariable.multiply(res,imultVariableXVariable.multInv(y) );
-	}
-
-	return imultCoeffXVariable.scalarMultiply(coeff, res);
-};
-
-
-///
-/// es ist nur der Sonderfall implementiert, in welchem coeff*x^i*y^j wieder in IMultiplyRing::ElementType landet. Dies ist nicht immer der Fall.
-template <class ccoeff>
-template <class IMultiplyRing  >
-typename IMultiplyRing::ElementType 	xyMonom<ccoeff>::substitute2(			
-								const typename IMultiplyRing::ElementType 		& x, 
-								const typename IMultiplyRing::ElementType 		& y,
-								const 	IMultiplyRing 				& imult
-							 ) const
-{
-
-	
-	/*typename IMultiplyRing::ElementType	res=IMultiplyRing::ElementType::One;
-
-	res.setEpsPrecision( imult.getEpsPrecision() );*/
-
-	typename IMultiplyRing::ElementType	res(imult.getEpsPrecision() ,std::string("") );
-	
-
-	assert(imult.getEpsPrecision()>= x.getEpsPrecision() );
-	assert(imult.getEpsPrecision()>= y.getEpsPrecision() );
-	res.setValue(0,1);
-	
-	for (int currXexp=1;	currXexp<=(int)exponents.getXExp(); currXexp++)
-	{
-		imult.multiplyInPlaceRef(res,x);
-	}
-
-	for (int currYexp=1;	currYexp<=(int)exponents.getYExp(); currYexp++)
-	{
-		 	imult.multiplyInPlaceRef(res,y);
-			
-	}
-	
-	assert(exponents.getYExp()>=0);
-	assert(exponents.getYExp()>=0);
-	
-	///  @todo merke: was negatives ist meistens größer als ein unsigned int!
-	/*for (int currXexp=-1;	currXexp>=(int)exponents.getXExp(); currXexp--)
-	{
-		 	imult.multiplyInPlace(res,  imult.multInv(x) );
-	}
-
-	for (int currYexp=-1;	currYexp>=(int)exponents.getYExp(); currYexp--)
-	{
-		 	imult.multiplyInPlace(res, imult.multInv(y) );
-	}*/
-
-	return imult.scalarMultiply(coeff, res);
-	///res= imult.multiply(coeff, res);
-	//res= imult.multiply( res, coeff);
-	//return res;
-};
-
-
-template <class xyMonomType>
-class xyOneFormTerm
-{
-	public:
-		 enum TermType
-	  	 {
-      		DXTERM, DYTERM
-		} ;
-
-		xyOneFormTerm(const xyMonomType & mon, TermType whichForm);
-		xyOneFormTerm(const std::string & str);
-		xyOneFormTerm(std::stringstream&  monomListStream);
-	
-		xyMonomType	getMonom() const	{	return xyMonom_m;	}
-		int getDegree()	const	{	return xyMonom_m.getDegree();	}
-		bool	isDxTerm() const	{	return whichDForm_m==xyOneFormTerm::DXTERM;	};
-		bool	isDyTerm() const	{	return whichDForm_m==xyOneFormTerm::DYTERM;	};
-
-	private:
-		 TermType 		whichDForm_m;
-		xyMonomType		xyMonom_m;
-};
-
-
-template <class xyMonomType>
-xyOneFormTerm<xyMonomType>::xyOneFormTerm(	const xyMonomType & mon,
-					 TermType whichForm	):	xyMonom_m(mon), 
-										whichDForm_m(whichForm)
-{
-	
-}
-
-/// @todo '+-' sollte nicht erlaubt sein,
-/// @todo beim Einlesen der Differentialform kann diese theoretisch = 0 sein - dann geht das Einlesen wohl schief.
-template <class xyMonomType>
-xyOneFormTerm<xyMonomType>::xyOneFormTerm(const std::string & paramstr)
-{
-
-	std::string error("Error reading xyOneFormTerm from stream: xyOneFormTerm only supports 'xyMonom'*dx and 'xyMonom'*dy -formed terms !\n");
-	
-//	str.erase(std::remove_if(str.begin(), str.end(), std::isspace), str.end() );
-
-	std::string str=eatWS(paramstr);
-
-	size_t pos = str.find("d");
-
-	#ifdef DEBUG
-	std::cerr << "paramstr = " << paramstr << std::endl;
-	#endif
-	// '-' und '+' sind vorerst nur als führendes Zeichen erlaubt! - TODO: Ja und was machst du, wenn es mehrere '-' und '+' gibt?
-	size_t posPlus = str.find("+");
-	if (posPlus!=str.npos)
-	{
-		assert(posPlus==0);
-	}
-
-	posPlus = str.find("-");
-	if (posPlus!=str.npos)
-	{
-		assert(posPlus==0);
-	}
-
-	if (pos==str.npos)
-	{
-		std::cerr << error<<	std::endl;;
-		assert (pos!=str.npos);
-	}
-	
-	str.substr(pos);
-
-	/// also: erstmal alle Whitespaces wegräumen.
-	/// wenn nur dx auftaucht, dann ist pos=0 und es handelt sich um  ein  1-Monom.
-	if (pos==0 && str.length()>0 )
-	{
-		xyMonom_m = xyMonomType(1, 0, 0 );
-	}
-	else
-	{
-
-		assert(pos>0);	// wenn ein Monom am Anfang steht, gibt es entweder ein '...*'dy  oder '-dy' !.
-		xyMonom_m = xyMonomType(1, 0, 0 );
-		std::string monomString ;
-		if (pos==1)
-		{
-			
-			monomString= str.substr(0, pos);
-			assert(monomString.at(0)=='-' || monomString.at(0)=='+');
-			if ( monomString.at(0)=='+')
-				monomString= monomString.substr(1);
-		}
-		else
-		{
-			assert(str.at(pos-1)=='*');
-			monomString= str.substr(0, pos-1);		
-			
-		}
-		//std::cerr << "monomString" << monomString <<std::endl;
-		std::stringstream sstream(monomString);
-		if (monomString.length()==0)
-			xyMonom_m = xyMonomType(1, 0, 0 );
-		else
-			xyMonom_m = xyMonomType(sstream);
-	
-	};
-	
-	//std::string differentialFormString 	std.substring(pos)
-	std::stringstream 	differentialFormString(	str.substr(pos) );
-	//std::cerr << "differentialFormString = '" << differentialFormString.str() << "'" << std::endl;
-	extractChar( 'd', differentialFormString );
-	
-
-
-	if (differentialFormString.eof() )
-	{
-		std::cerr << error << std::endl;;
-		assert( ! differentialFormString.eof() );
-	}
-
-	if (differentialFormString.peek()=='x')
-	{
-		extractChar('x', differentialFormString);
-		whichDForm_m=DXTERM;
-	}
-	else if (differentialFormString.peek()=='y')
-	{
-		extractChar('y', differentialFormString);
-		whichDForm_m=DYTERM;
-	}
-	else
-	{
-		std::cerr << error ;
-		assert(false);
-	}
-	differentialFormString.peek();
-	if ( ! differentialFormString.eof() )
-	{
-		std::cerr << error << std::endl;
-		std::cerr << "differentialFormString" << differentialFormString.str() << std::endl;
-		assert(  differentialFormString.eof() );
-	}
-}
-
-//string::npos
-
-
-/*
-template <class xyMonomType>
-xyOneFormTerm<xyMonomType>::xyOneFormTermNew(const std::string & paramstr)
-{
-	//1. Zerlege String in Einzelteile.
-}
-*/
-
-
-
-template <class PolynomXYType>
-class xyOneForm 
-{
-	public:
-
-		xyOneForm(const PolynomXYType & pdx, const PolynomXYType & pdy);
-		xyOneForm(const std::string  & str);
-		xyOneForm(std::stringstream&  monomListStream);
-	
-		PolynomXYType	getDxFormPart() const	{	return polynomDX_m;	}
-		PolynomXYType	getDyFormPart() const	{	return polynomDY_m;	}
-
-
-	private:
-
-		 PolynomXYType 		polynomDX_m;
-		PolynomXYType 		polynomDY_m;
-		
-};
-
-
-template <class PolynomXYType>
-xyOneForm<PolynomXYType>::xyOneForm(	const PolynomXYType & pdx,
-				 const PolynomXYType & pdy): 	polynomDX_m(pdx),
-									polynomDY_m(pdy)
-{
-
-}
-
-/// TODO: kein Term darf doppelt vorkommen. 
-template <class PolynomXYType>
-xyOneForm<PolynomXYType>::xyOneForm(const std::string  & str)
-{
-
-	std::string tmpString = eatWS(str);
-	// 1. zerlege Zeichenkette in Summanden und parse jede einzelnen Summanden.
-	typedef xyMonom < typename PolynomXYType::CoefficientType> xyMonomType;
-
-	std::vector<xyOneFormTerm <xyMonomType > > monomTerms;
-
-	size_t pos = tmpString.npos;
-
-	// todo: zugelassene Tokens sind nur 'dx','dy' 'x','y','x^exponent','y^exponent','+','-', '(0...9)*'. , Exponent ist eine Zahl ohne Vorzeichen. Keine Klammern etc.!
-	size_t posKlammer = tmpString.find_last_of('(');
-	assert(   posKlammer==tmpString.npos);
-	posKlammer = tmpString.find_last_of(')');
-
-	
-	assert(   posKlammer==tmpString.npos);
-
-	//suche von Ende der Zeichenkette aus nach Summanden  und trage diese in die monomTerms-Liste ein. TODO: ->Fehleranfaellig, da Klammerung vorkommen kann, etc. 
-	
-	while (pos !=0)
-	{
-		size_t posPlus = tmpString.find_last_of('+');
-		size_t posMinus = tmpString.find_last_of('-');
-	
-		assert( posPlus==tmpString.npos || posPlus<tmpString.npos);
-		assert(posMinus==tmpString.npos || posMinus<tmpString.npos);
-	
-		if (posPlus==tmpString.npos)
-			pos=posMinus;
-		else if (posMinus==tmpString.npos)
-			pos=posPlus;
-		else
-			pos= std::max(posPlus, posMinus);
-
-		if (pos==tmpString.npos)
-			pos=0;
-
-		// wenn das erste Zeichen ein Plus(+) oder Minus(-) ist, suche bis zum naechsten Zeichen
-		// alternativ: 
-		assert( tmpString.npos != 0 );
-		if ( pos != tmpString.npos )
-		{
-			std::string monomString = tmpString.substr(pos);
-			xyOneFormTerm <xyMonomType >  oneFormTerm(monomString);
-			monomTerms.push_back(oneFormTerm);
-			tmpString= tmpString.substr(0,pos);
-		}
-	}
-	
-	// 2. ermittle höchsten vorkommenden Grad der Monome
-
-	int maxDegree=0;
-
-	for (size_t i=0;i < monomTerms.size(); i++)
-	{
-		maxDegree = max( monomTerms[i].getDegree(), maxDegree);
-	}
-
-	// 3. lege polynomDX_m und polynomDY_m an - fertig!
-
-
-	polynomDX_m.clear();
-	polynomDX_m.setDegree(maxDegree);
-	polynomDY_m.clear();
-	polynomDY_m.setDegree(maxDegree);
-
-	
-	PolynomXYType pObserver(maxDegree);
-	PolynomXYType qObserver(maxDegree);
-
-
-	for (size_t i=0;i < monomTerms.size(); i++)
-	{
-
-		xyMonomType mon = monomTerms[i].getMonom();
-		if (monomTerms[i].isDxTerm() )
-		{
-			//sicherstellen, dass kein Koeffizient in der Eingabe doppelt vorkommt
-			assert( pObserver.getCoeff(mon.getXExp(), mon.getYExp())==typename PolynomXYType::CoefficientType(0) );
-			polynomDX_m.setCoeff(mon.getXExp(), mon.getYExp(), mon.getCoeff() );
-			pObserver.setCoeff(mon.getXExp(), mon.getYExp(), 1 );
-		}
-		else if (monomTerms[i].isDyTerm() )
-		{
-			//sicherstellen, dass kein Koeffizient in der Eingabe doppelt vorkommt 
-			assert( qObserver.getCoeff(mon.getXExp(), mon.getYExp())==typename PolynomXYType::CoefficientType(0) );
-			polynomDY_m.setCoeff( mon.getXExp(), mon.getYExp(), mon.getCoeff() );
-			qObserver.setCoeff(mon.getXExp(), mon.getYExp(), 1 );
-		}
-		else
-			assert(false);
-
-	}
-
-	
-}
-
diff --git a/sandbox/hurwitz.kroeker/tst/hurwitz.tst b/sandbox/hurwitz.kroeker/tst/hurwitz.tst
deleted file mode 100644
index 1102676..0000000
--- a/sandbox/hurwitz.kroeker/tst/hurwitz.tst
+++ /dev/null
@@ -1,402 +0,0 @@
-#############################################################################
-##
-#W  hurwitz.tst                  FR Package               Jakob Kroeker
-##
-#H  @(#)$Id$
-##
-#Y  Copyright (C) 2012,  Laurent Bartholdi
-##
-#############################################################################
-##
-##  This file tests the finite field hurwitz map search and lift.
-##
-#############################################################################
-
-# following lines generated with ' str:= @Hurwitz.CreateTestString(true); Print(str); '
-# Hurwitz@FR.Tests.TEST_RATIONAL_PAIR_TO_COMPLEX : 
-#
-gap>     Assert( 0, infinity = Hurwitz@FR.Internal.RationalPairToComplex( [ infinity, infinity ] ) );;
-gap>     Assert( 0, 0.0_c = Hurwitz@FR.Internal.RationalPairToComplex( [ 0, 0 ] ) );;
-gap>     Assert( 0, 1.0_c = Hurwitz@FR.Internal.RationalPairToComplex( [ 1, 0 ] ) );;
-#
-#
-# Hurwitz@FR.Tests.TEST_COMPUTE_SHAPE : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     pol := 3 * (x + 1) * (x + 2) ^ 2;;
-gap>     shape := ComputeShape@FR( pol );;
-gap>     Assert( 0, shape.partition = [ 2, 1 ] );;
-gap>     rng := PolynomialRing( Integers, [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     pol := (x + 1) * (x + 2) ^ 2;;
-gap>     shape := ComputeShape@FR( pol );;
-gap>     Assert( 0, shape.partition = [ 2, 1 ] );;
-gap>     rng := PolynomialRing( GF( 11 ), [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     pol := 5 * (x + 1) * (x + 2) ^ 2;;
-gap>     shape := ComputeShape@FR( pol );;
-gap>     Assert( 0, shape.partition = [ 2, 1 ] );;
-gap>     rng := PolynomialRing( GF( 121 ), [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     pol := (x + 1) * (x + 2) ^ 2;;
-gap>     shape := ComputeShape@FR( pol );;
-gap>     Assert( 0, shape.partition = [ 2, 1 ] );;
-gap>     rng := PolynomialRing( ZmodnZ( 121 ), [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     pol := (x + 1) * (x + 2) ^ 2;;
-#
-#
-# Hurwitz@FR.Tests.TEST_ROOT_MULTIPLICITY : 
-#
-gap> 
-gap>     rng := PolynomialRing( GF( 121 ), [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     pol := (x + 1) * (x + 2) ^ 2;;
-gap>     Assert( 0, 0 = RootMultiplicity@FR( pol, -3 ) );;
-gap>     Assert( 0, 2 = RootMultiplicity@FR( pol, -2 ) );;
-gap>     Assert( 0, 1 = RootMultiplicity@FR( pol, -1 ) );;
-gap>     polDegree := 4;;
-gap>     Assert( 0, 1 = RootMultiplicity@FR( pol, infinity, polDegree ) );;
-#
-#
-# Hurwitz@FR.Tests.TEST_HOMOGENIZE_VALUES : 
-#
-gap> 
-gap>     field := GF( 11 );;
-gap>     values := [ One( field ), Zero( field ), infinity, One( field ) * 5 ];;
-gap>     homValues := Hurwitz@FR.Internal.HomogenizeValues( values, field );;
-gap>     Assert( 0, Size( homValues ) = Size( values ) );;
-gap>     Assert( 0, homValues[1] = [ One( field ), One( field ) ] );;
-gap>     Assert( 0, homValues[2] = [ Zero( field ), One( field ) ] );;
-gap>     Assert( 0, homValues[3] = [ One( field ), Zero( field ) ] );;
-gap>     Assert( 0, homValues[4] = [ 5 * One( field ), One( field ) ] );;
-#
-#
-# Hurwitz@FR.Tests.TEST_DEHOMOGENIZE_VALUES : 
-#
-gap> 
-gap>     field := GF( 11 );;
-gap>     values := [ One( field ), Zero( field ), infinity, One( field ) * 5 ];;
-gap>     homValues := Hurwitz@FR.Internal.HomogenizeValues( values, field );;
-gap>     deHomVal := Hurwitz@FR.Internal.DehomogenizeValues( homValues, field );;
-gap>     Assert( 0, values = deHomVal );;
-#
-#
-# Hurwitz@FR.Tests.TEST_CRITICAL_VALUES_NORMALIZATION : 
-#
-gap> 
-gap>     fieldSize := 7;;
-gap>     finiteField := GF( fieldSize );;
-gap>     criticalValues := [ 0 * Z( fieldSize ), Z( fieldSize ) ^ 1, Z( fieldSize ) ^ 6, infinity ];;
-gap>     criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );;
-gap>     Assert( 0, criticalValuesTrans[1] = infinity );;
-gap>     Assert( 0, criticalValuesTrans[2] = Zero( finiteField ) );;
-gap>     Assert( 0, criticalValuesTrans[3] = One( finiteField ) );;
-#
-#
-# Hurwitz@FR.Tests.TEST_COMPUTE_HURWITZ_MAP_SEARCH_SPACE_SIZE : 
-#
-gap> 
-gap>     fieldSize := 11;;
-gap>     finiteField := Field( Z( fieldSize ) );;
-gap>     criticalValues := [ infinity, 0 * Z( fieldSize ), Z( fieldSize ) ^ 1 ];;
-gap>     partitions := [ [ 4, 3, 2, 2, 2 ], [ 4, 3, 2, 2, 2 ], [ 4, 3, 2, 2, 2 ] ];;
-gap>     searchSpaceSize := HurwitzMapSearchSpaceSize@FR( finiteField, partitions, criticalValues );;
-gap>     Assert( 0, searchSpaceSize = 112258800 );;
-#
-#
-# Hurwitz@FR.Tests.TEST_HMS_THREE_CRITICAL_VALUES : 
-#
-gap> 
-gap>     fieldSize := 11;;
-gap>     finiteField := GF( fieldSize );;
-gap>     permutations := [ (1,2), (2,3), (1,2,3) ];;
-gap>     degree := Maximum( List( permutations, LargestMovedPoint ) );;
-gap>     partitions := List( permutations, function ( p )
-gap>             return CycleLengths( p, [ 1 .. degree ] );;
-gap>         end );;
-gap>     criticalValues := [ infinity, 0 * Z( fieldSize ), Z( fieldSize ) ^ 0 ];;
-gap>     maps := FindHurwitzMapModPrime@FR( finiteField, permutations, criticalValues );;
-gap>     criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );;
-gap>     mapData := maps[1];;
-gap>     Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP( mapData, partitions, criticalValues, criticalValuesTrans, false );;
-gap>     maps := [  ];;
-gap>     criticalValues := [ 0 * Z( fieldSize ), infinity, Z( fieldSize ) ^ 0 ];;
-gap>     maps := FindHurwitzMapModPrime@FR( finiteField, permutations, criticalValues );;
-gap>     criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );;
-gap>     mapData := maps[1];;
-gap>     Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP( mapData, partitions, criticalValues, criticalValuesTrans, false );;
-#
-#
-# Hurwitz@FR.Tests.TEST_HMS_STRICT_NORMALIZATION : 
-#
-gap> 
-gap>     fieldSize := 11;;
-gap>     finiteField := GF( fieldSize );;
-gap>     permutations := [ (1,2), (2,3), (1,2,3) ];;
-gap>     Assert( 0, Product( permutations ) = () );;
-gap>     degree := Maximum( List( permutations, LargestMovedPoint ) );;
-gap>     partitions := List( permutations, function ( p )
-gap>             return CycleLengths( p, [ 1 .. degree ] );;
-gap>         end );;
-gap>     partitions := [ [ 2, 1 ], [ 1, 2 ], [ 3 ] ];;
-gap>     criticalValues := [ infinity, 0 * Z( fieldSize ), Z( fieldSize ) ^ 0 ];;
-gap>     strictNormalization := true;;
-gap>     maps := FindHurwitzMapModPrime@FR( finiteField, partitions, criticalValues, strictNormalization );;
-gap>     Assert( 0, Size( maps ) = 1 );;
-gap>     criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );;
-gap>     Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP( maps[1], partitions, criticalValues, criticalValuesTrans, strictNormalization );;
-#
-#
-# Hurwitz@FR.Tests.TEST_HMS_FOUR_CRITICAL_VALUES : 
-#
-gap> 
-gap>     fieldSize := 7;;
-gap>     finiteField := GF( fieldSize );;
-gap>     partitions := [ [ 2, 1 ], [ 2, 1 ], [ 2, 1 ], [ 2, 1 ] ];;
-gap>     criticalValues := [ infinity, 0 * Z( fieldSize ), Z( fieldSize ) ^ 0, Z( fieldSize ) ^ 5 ];;
-gap>     strictNormalization := false;;
-gap>     maps := FindHurwitzMapModPrime@FR( finiteField, partitions, criticalValues, strictNormalization );;
-gap>     Assert( 0, Size( maps ) = 1 );;
-gap>     criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );;
-gap>     Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP( maps[1], partitions, criticalValues, criticalValuesTrans, strictNormalization );;
-#
-#
-# Hurwitz@FR.Tests.TEST_HMS_UNCOMMON_CRITICAL_VALUES : 
-#
-gap> 
-gap>     fieldSize := 7;;
-gap>     finiteField := GF( fieldSize );;
-gap>     partitions := [ [ 2, 1 ], [ 2, 1 ], [ 2, 1 ], [ 2, 1 ] ];;
-gap>     criticalValues := [ infinity, 0 * Z( fieldSize ), Z( fieldSize ) ^ 1, Z( fieldSize ) ^ 6 ];;
-gap>     strictNormalization := false;;
-gap>     maps := FindHurwitzMapModPrime@FR( finiteField, partitions, criticalValues, strictNormalization );;
-gap>     Assert( 0, Size( maps ) = 1 );;
-gap>     criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );;
-gap>     Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP( maps[1], partitions, criticalValues, criticalValuesTrans, strictNormalization );;
-gap>     maps := [  ];;
-gap>     criticalValues := [ 0 * Z( fieldSize ), infinity, Z( fieldSize ) ^ 0, Z( fieldSize ) ^ 1 ];;
-gap>     maps := FindHurwitzMapModPrime@FR( finiteField, partitions, criticalValues, strictNormalization );;
-gap>     Assert( 0, Size( maps ) = 1 );;
-gap>     criticalValuesTrans := Hurwitz@FR.Internal.NormalizeCriticalValues( criticalValues, finiteField );;
-gap>     Hurwitz@FR.Internal.CHECK_FINITE_FIELD_MAP( maps[1], partitions, criticalValues, criticalValuesTrans, strictNormalization );;
-#
-#
-# Hurwitz@FR.Tests.TEST_COMPUTE_ALPHA_FACTORS : 
-#
-gap> 
-gap>     field := GF( 16 );;
-gap>     rng := PolynomialRing( GF( 16 ), [ "x" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     polTuple := [ Z( 16 ) * x ^ 0, Z( 16 ) ^ 2 * 0, Z( 16 ) ^ 3 * x ^ 0 ];;
-gap>     alphaFactors := Hurwitz@FR.Internal.ComputeAlphaFactors( polTuple, field );;
-gap>     Assert( 0, not fail = alphaFactors );;
-gap>     Assert( 0, CoefficientsFamily( FamilyObj( polTuple[1] ) ) = ElementsFamily( FamilyObj( alphaFactors ) ) );;
-#
-#
-# Hurwitz@FR.Tests.TEST_REQUIRED_COEFF_UNKNOWN_NUMBER : 
-#
-gap> 
-gap>     coeffFieldRef := [ Null@FR ];;
-gap>     polTuple := Hurwitz@FR.Internal.CreateDefaultTestPolTuple( coeffFieldRef );;
-gap>     Assert( 0, 14 = Hurwitz@FR.Internal.RequiredCoeffUnknownNumber( polTuple, [  ] ) );;
-gap>     x := IndeterminateOfUnivariateRationalFunction( polTuple[1] );;
-gap>     factorsToIgnore := [ x - 1, x ];;
-gap>     Assert( 0, 12 = Hurwitz@FR.Internal.RequiredCoeffUnknownNumber( polTuple, factorsToIgnore ) );;
-#
-#
-# Hurwitz@FR.Tests.TEST_CREATE_HURWITZ_MAP_SEARCH_PROBLEM : 
-#
-gap> 
-gap>     hmsProblem := HurwitzMapSearchProblem@FR( [ [ 4, 3, 2, 2, 2 ], [ 3, 4, 2, 2, 2 ], [ 3, 2, 4, 2, 2 ] ], [ [ infinity, infinity ], [ 0, 0 ], [ 1, 0 ] ], true );;
-gap>     Assert( 0, hmsProblem.shapes = [ Shape@FR( [ 4, 3, 2, 2, 2 ] ), Shape@FR( [ 4, 3, 2, 2, 2 ] ), Shape@FR( [ 4, 3, 2, 2, 2 ] ) ] );;
-gap>     Assert( 0, hmsProblem.criticalValues = [ [ infinity, infinity ], [ 0, 0 ], [ 1, 0 ] ] );;
-gap>     Assert( 0, hmsProblem.normalizationRules[1] = rec(
-gap>           dataType := "NormalizationRule",
-gap>           multiplicity := 4,
-gap>           polynomialId := 1,
-gap>           root := infinity ) );;
-gap>     Assert( 0, hmsProblem.normalizationRules[2] = rec(
-gap>           dataType := "NormalizationRule",
-gap>           multiplicity := 3,
-gap>           polynomialId := 2,
-gap>           root := 0 ) );;
-gap>     Assert( 0, hmsProblem.normalizationRules[3] = rec(
-gap>           dataType := "NormalizationRule",
-gap>           multiplicity := 3,
-gap>           polynomialId := 3,
-gap>           root := 1 ) );;
-#
-#
-# Hurwitz@FR.Tests.TEST_COMPUTE_MIN_POLY : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     mp := RationalMinPolyFromRootApprox@FR( [ 0, -1 ], x );;
-gap>     Assert( 0, mp = x ^ 2 + 1 );;
-gap>     mp := RationalMinPolyFromRootApprox@FR( [ 0, -1 / 2 ], x );;
-gap>     Assert( 0, mp = 4 * x ^ 2 + 1 );;
-gap>     mp := RationalMinPolyFromRootApprox@FR( [ 35 / 11, 0 ], x );;
-gap>     Assert( 0, mp = 11 * x - 35 );;
-#
-#
-# Hurwitz@FR.Tests.TEST_CREATE_FACTORED_IDEAL_TERM : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x", "y" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     y := indeterminates[2];;
-gap>     polynomial := (x ^ 4 - 4) ^ 3 * (4 * x ^ 2 + 2);;
-gap>     prod := UNIQUE_PRODUCT@FR( polynomial );;
-gap>     prod := REMOVE_CONSTANT_FACTORS@FR( prod );;
-gap>     normalizedPolynomial := PRODUCT_VALUE@FR( prod );;
-gap>     UNIQUE_PRODUCT@FR( normalizedPolynomial );;
-gap>     UNIQUE_PRODUCT@FR( polynomial );;
-gap>     dstRng := PolynomialRing( Integers, 14 );;
-gap>     prevIterWarnVal := ITER_POLY_WARN;;
-gap>     ITER_POLY_WARN := false;;
-gap>     postRng := PolynomialRing( dstRng, 1 );;
-gap>     ITER_POLY_WARN := prevIterWarnVal;;
-gap>     postDstIndeterminates := IndeterminatesOfPolynomialRing( postRng );;
-gap>     dstIndeterminates := IndeterminatesOfPolynomialRing( dstRng );;
-gap>     coeffVariables := List( [ 1 .. 14 ], function ( n )
-gap>             return dstIndeterminates[n];;
-gap>         end );;
-gap>     commonVariable := postDstIndeterminates[1];;
-gap>     coeffVariableIterator := Iterator( coeffVariables );;
-gap>     idealTerm := Hurwitz@FR.Internal.CreateFactoredIdealTerm( normalizedPolynomial, coeffVariableIterator, postRng, commonVariable, [  ] );;
-gap>     Assert( 0, Degree( PRODUCT_VALUE@FR( idealTerm ) ) = 14 );;
-gap>     coeffVariableIterator := Iterator( coeffVariables );;
-gap>     idealTerm := Hurwitz@FR.Internal.CreateFactoredIdealTerm( normalizedPolynomial, coeffVariableIterator, postRng, commonVariable, [ x + Z( 11 ) ^ 8 ] );;
-gap>     coeffVariableIterator := Iterator( coeffVariables );;
-gap>     idealTerm := Hurwitz@FR.Internal.CreateFactoredIdealTerm( normalizedPolynomial, coeffVariableIterator, postRng, commonVariable, [  ] );;
-gap>     Assert( 0, Degree( PRODUCT_VALUE@FR( idealTerm ) ) = 14 );;
-#
-#
-# Hurwitz@FR.Tests.TEST_POLTUPLE_TO_IDEAL_POINT : 
-#
-gap> 
-gap>     coeffFieldRef := [ Null@FR ];;
-gap>     polTuple := Hurwitz@FR.Internal.CreateDefaultTestPolTuple( coeffFieldRef );;
-gap>     alphaFactors := Hurwitz@FR.Internal.ComputeAlphaFactors( polTuple, coeffFieldRef[1] );;
-gap>     point := Hurwitz@FR.Internal.PolTupleToIdealPoint( polTuple, coeffFieldRef[1], [  ] );;
-gap>     humanReadablePoint := List( [ 1 .. Size( point ) ], function ( n )
-gap>             return Int( point[n] );;
-gap>         end );;
-gap>     Assert( 0, Size( point ) = 15 );;
-gap>     Assert( 0, humanReadablePoint = [ 6, 3, 2, 3, 0, 3, 0, 8, 6, 10, 8, 0, 9, 8, 7 ] );;
-gap>     x := IndeterminateOfUnivariateRationalFunction( polTuple[1] );;
-gap>     factorBasesToIgnore := [ x, x - 1 ];;
-gap>     point := Hurwitz@FR.Internal.PolTupleToIdealPoint( polTuple, coeffFieldRef[1], factorBasesToIgnore );;
-gap>     humanReadablePoint := List( [ 1 .. Size( point ) ], function ( n )
-gap>             return Int( point[n] );;
-gap>         end );;
-gap>     Assert( 0, Size( point ) = 13 );;
-gap>     Assert( 0, humanReadablePoint = [ 6, 3, 2, 3, 3, 0, 8, 6, 8, 0, 9, 8, 7 ] );;
-#
-#
-# Hurwitz@FR.Tests.TEST_APPROX_HURWITZ_MAPS : 
-#
-gap> 
-gap>     fieldSize := 11;;
-gap>     finiteField := GF( fieldSize );;
-gap>     permutations := [ (1,2,3), (1,2), (2,3) ];;
-gap>     mapDegree := Maximum( List( permutations, LargestMovedPoint ) );;
-gap>     partitions := [ [ 3 ], [ 2, 1 ], [ 2, 1 ] ];;
-gap>     complexCriticalValueRationalApprox := [ [ infinity, infinity ], [ 0, 0 ], [ 1, 0 ] ];;
-gap>     reducedCriticalValues := [ infinity, 0 * Z( fieldSize ), Z( fieldSize ) ^ 0 ];;
-gap>     strictNormalization := true;;
-gap>     mapsModPrime := FindHurwitzMapModPrime@FR( finiteField, partitions, reducedCriticalValues, strictNormalization );;
-gap>     liftOptions := @PadicLift.LiftOptions(  );;
-gap>     liftOptions.setDecimalPrecision( 24 );;
-gap>     hurwitzMapSearchProblem := HurwitzMapSearchProblem@FR( partitions, complexCriticalValueRationalApprox, strictNormalization );;
-gap>     hurwitzMapCandidates := ApproxComplexHurwitzMaps@FR( hurwitzMapSearchProblem, mapsModPrime[1][2], finiteField, liftOptions );;
-gap>     Assert( 0, ForAll( hurwitzMapCandidates, function ( mapCandidate )
-gap>             return mapCandidate.maxResidue < 1.0e-15;;
-gap>         end ) );;
-gap>     z := hurwitzMapCandidates[1].indeterminate;;
-gap>     Assert( 0, Degree( (3.0_c * z ^ 2 + (- 2.0_c) * z ^ 3) / hurwitzMapCandidates[1].map ) = 0 );;
-#
-#
-# Hurwitz@FR.Tests.TEST_APPROX_HURWITZ_MAPS_FOUR_CV : 
-#
-gap> 
-gap>     hurwitzMapCandidates := [  ];;
-gap>     finiteField := GF( 13 );;
-gap>     mapDegree := 3;;
-gap>     partitions := [ [ 1, 2 ], [ 2, 1 ], [ 2, 1 ], [ 2, 1 ] ];;
-gap>     approxBranchValues := [ [ infinity, infinity ], [ 0, 0 ], [ 1, 0 ], [ 0 / 1, -1 / 2 ] ];;
-gap>     reducedCritivalValueLists := Hurwitz@FR.ReduceCriticalValuesApprox( approxBranchValues, finiteField );;
-gap>     strictNormalization := true;;
-gap>     for reducedCriticalValues  in reducedCritivalValueLists  do
-gap>         mapsModPrime := FindHurwitzMapModPrime@FR( finiteField, partitions, reducedCriticalValues, strictNormalization );;
-gap>         if Size( mapsModPrime ) > 0  then
-gap>             liftOptions := @PadicLift.LiftOptions(  );;
-gap>             liftOptions.setDecimalPrecision( 24 );;
-gap>             for mapModPrime  in mapsModPrime  do
-gap>                 hurwitzMapSearchProblem := HurwitzMapSearchProblem@FR( partitions, approxBranchValues, strictNormalization );;
-gap>                 currentHurwitzMapCandidates := ApproxComplexHurwitzMaps@FR( hurwitzMapSearchProblem, mapModPrime[2], finiteField, liftOptions );;
-gap>                 Append( hurwitzMapCandidates, currentHurwitzMapCandidates );;
-gap>             od;;
-gap>         fi;;
-gap>     od;;
-gap>     approxMapCandidatesCount := Number( hurwitzMapCandidates, function ( mapCandidate )
-gap>             return mapCandidate.maxResidue < 1.0e-15;;
-gap>         end );;
-gap>     Assert( 0, approxMapCandidatesCount = 4 );;
-#
-#
-# Hurwitz@FR.Tests.TEST_CREATE_LIFTER : 
-#
-gap> 
-gap>     hmsProblem := HurwitzMapSearchProblem@FR( [ [ 4, 3, 2, 2, 2 ], [ 3, 4, 2, 2, 2 ], [ 3, 2, 4, 2, 2 ] ], [ [ infinity, infinity ], [ 0, 0 ], [ 1, 0 ] ], true );;
-gap>     coeffFieldRef := [ Null@FR ];;
-gap>     hurwitzMapLifter := Hurwitz@FR.Internal.CreateDefaultTestPolTuple( coeffFieldRef );;
-gap>     hurwitzMapLifter := HurwitzMapLifter@FR( hurwitzMapLifter, coeffFieldRef[1], hmsProblem );;
-#
-#
-# Hurwitz@FR.Tests.TEST_EXTRACT_FACTOR_BY_ROOT : 
-#
-gap> 
-gap>     lifter := Hurwitz@FR.Internal.CreateDefaultLifter(  );;
-gap>     infinityFactor := Hurwitz@FR.Internal.PolsetExtractFactorByRoot( lifter, infinity );;
-gap>     zeroFactor := Hurwitz@FR.Internal.PolsetExtractFactorByRoot( lifter, 0 );;
-gap>     oneFactor := Hurwitz@FR.Internal.PolsetExtractFactorByRoot( lifter, 1 );;
-gap>     Assert( 0, not infinityFactor = Null@FR );;
-gap>     Assert( 0, not zeroFactor = Null@FR );;
-gap>     Assert( 0, not oneFactor = Null@FR );;
-gap>     Assert( 0, infinityFactor.polynomialId = 1 );;
-gap>     Assert( 0, zeroFactor.polynomialId = 2 );;
-gap>     Assert( 0, oneFactor.polynomialId = 3 );;
-gap>     variable := IndeterminateOfUnivariateRationalFunction( lifter.polTuple[1] );;
-gap>     Assert( 0, IsZero( Value( lifter.polTuple[zeroFactor.polynomialId], [ variable ], [ 0 ] ) ) );;
-gap>     Assert( 0, IsZero( Value( lifter.polTuple[oneFactor.polynomialId], [ variable ], [ 1 ] ) ) );;
-gap>     Assert( 0, Degree( lifter.polTuple[infinityFactor.polynomialId] ) < lifter.getMapDegree(  ) );;
-gap>     Assert( 0, IsZero( Value( zeroFactor.factor[1], [ variable ], [ 0 ] ) ) );;
-gap>     Assert( 0, IsZero( Value( oneFactor.factor[1], [ variable ], [ 1 ] ) ) );;
-#
-#
-# Hurwitz@FR.Tests.TEST_CREATE_LIFT_INPUT_DATA : 
-#
-gap> 
-gap>     hurwitzMapLifter := Hurwitz@FR.Internal.CreateDefaultLifter(  );;
-gap>     gens := GeneratorsOfTwoSidedIdeal( hurwitzMapLifter.ideal );;
-gap>     jac := Jacobian@FR( gens, hurwitzMapLifter.unknownVariables );;
-gap>     jacAt := EvalPolynomialTensor@FR( jac, hurwitzMapLifter.unknownVariables, hurwitzMapLifter.point );;
-gap>     Assert( 0, Rank( jacAt ) = 13 );;
-
-
-
-#E hurwitz.tst . . . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/tst/padicLift.tst b/sandbox/hurwitz.kroeker/tst/padicLift.tst
deleted file mode 100644
index 60de0ec..0000000
--- a/sandbox/hurwitz.kroeker/tst/padicLift.tst
+++ /dev/null
@@ -1,296 +0,0 @@
-#############################################################################
-##
-#W  padicLift.tst                  FR Package               Jakob Kroeker
-##
-#H  @(#)$Id$
-##
-#Y  Copyright (C) 2012,  Laurent Bartholdi
-##
-#############################################################################
-##
-##  This file tests the padicLift
-##
-#############################################################################
-
-#  following lines generated with "str:= @PadicLift.CreateTestString(true); Print(str);"
-#
-#
-# @PadicLift.Tests.TEST_LIFT_OPTIONS : 
-#
-gap> 
-gap>     liftOptions := LiftOptions@FR(  );;
-gap>     liftOptions.setMaxLiftDepth( 22 );;
-gap>     Assert( 0, liftOptions.maxLiftDepth(  ) = 22 );;
-gap>     liftOptions.setMaxLatticeDim( 3 );;
-gap>     Assert( 0, liftOptions.maxLatticeDim(  ) = 3 );;
-gap>     liftOptions.setVerboseLevel( 2 );;
-gap>     Assert( 0, liftOptions.verboseLevel(  ) = 2 );;
-gap>     liftOptions.setVerbosePairing( false );;
-gap>     Assert( 0, liftOptions.verbosePairing(  ) = false );;
-gap>     liftOptions.setInitialLatticeDim( 4 );;
-gap>     Assert( 0, liftOptions.initialLatticeDim(  ) = 4 );;
-gap>     liftOptions.setInitialLiftDepth( 0 );;
-gap>     Assert( 0, liftOptions.initialLiftDepth(  ) = 0 );;
-gap>     liftOptions.setMaxPairingTolerance( 0.1 );;
-gap>     Assert( 0, liftOptions.maxPairingTolerance(  ) = 0.1 );;
-gap>     CHECK_LIFT_OPTIONS@FR( liftOptions );;
-#
-#
-# @PadicLift.Tests.TEST_LLL : 
-#
-gap> 
-gap>     mat := [ [ 1, 2 ], [ 2, 1 ] ];;
-gap>     lllResult := FPLLLReducedBasis( mat );;
-gap>     Assert( 0, lllResult = [ [ 1, -1 ], [ 1, 2 ] ] );;
-#
-#
-# @PadicLift.Tests.TEST_JENKINS_TRAUB_USAGE : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, [ "x" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     FZ1 := 33 * x ^ 3 + 19 * x ^ 2 - 81 * x - 4;;
-gap>     roots := RootsByJenkinsTraub@FR( FZ1, 16 );;
-gap>     roots := RootsByJenkinsTraub@FR( FZ1, 320 );;
-gap>     roots := RootsByJenkinsTraub@FR( FZ1, 330 );;
-gap>     rootCalculator := CreateJenkinsTraubWrapper@FR( 16 );;
-gap>     roots := rootCalculator.computeRoots( FZ1 );;
-gap>     roots := rootCalculator.computeRoots( FZ1 );;
-gap>     roots := rootCalculator.computeRoots( FZ1 );;
-#
-#
-# @PadicLift.Tests.TEST_LIFT_STEP_1@FR : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     FZ := 33 * x ^ 3 + 19 * x ^ 2 - 81 * x - 4;;
-gap>     ideal := Ideal( rng, [ FZ ] );;
-gap>     jac := Jacobian@FR( [ FZ ], ind );;
-gap>     solution := [ Z( 11 ) ^ 0 ];;
-gap>     gens := GeneratorsOfTwoSidedIdeal( ideal );;
-gap>     Assert( 0, IsZero( Value( FZ, ind, solution ) ) );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, ind, solution ) ) );;
-gap>     solution := QuadraticLiftStep@FR( gens, jac, ind, solution );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, ind, solution ) ) );;
-#
-#
-# @PadicLift.Tests.TEST_BLACKBOX_LIFT_STEP_1 : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, [ "x" ] );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     FZ := 33 * x ^ 3 + 19 * x ^ 2 - 81 * x - 4;;
-gap>     ideal := Ideal( rng, [ FZ ] );;
-gap>     jac := Jacobian@FR( [ FZ ], ind );;
-gap>     solution := [ Z( 11 ) ^ 0 ];;
-gap>     gens := GeneratorsOfTwoSidedIdeal( ideal );;
-gap>     Assert( 0, IsZero( Value( FZ, ind, solution ) ) );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, ind, solution ) ) );;
-gap>     evalIdealGens := function ( point )
-gap>           return EvalPolynomialTensor@FR( gens, ind, point );;
-gap>       end;;
-gap>     jacobianAt := function ( point )
-gap>           return EvalPolynomialTensor@FR( jac, ind, point );;
-gap>       end;;
-gap>     solution := BlackBoxQuadraticLiftStep@FR( evalIdealGens, jacobianAt, solution );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, ind, solution ) ) );;
-#
-#
-# @PadicLift.Tests.TEST_LIFT_STEP_2 : 
-#
-gap> 
-gap>     problem := CREATE_RATIONAL_TEST_PROBLEM@FR(  );;
-gap>     gens := GeneratorsOfTwoSidedIdeal( problem.ideal );;
-gap>     jac := Jacobian@FR( gens, problem.indeterminates );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, problem.indeterminates, problem.solution ) ) );;
-gap>     solution := QuadraticLiftStep@FR( gens, jac, problem.indeterminates, problem.solution );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, problem.indeterminates, solution ) ) );;
-#
-#
-# @PadicLift.Tests.TEST_PADIC_LIFT : 
-#
-gap> 
-gap>     problem := CREATE_RATIONAL_TEST_PROBLEM@FR(  );;
-gap>     solution := PadicLift@FR( problem.ideal, problem.solution, 3 );;
-gap>     gens := GeneratorsOfTwoSidedIdeal( problem.ideal );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, problem.indeterminates, solution ) ) );;
-#
-#
-# @PadicLift.Tests.TEST_BLACKBOX_PADIC_LIFT : 
-#
-gap> 
-gap>     problem := CREATE_RATIONAL_TEST_PROBLEM@FR(  );;
-gap>     gens := GeneratorsOfTwoSidedIdeal( problem.ideal );;
-gap>     evalIdealGens := function ( point )
-gap>           return EvalPolynomialTensor@FR( gens, problem.indeterminates, point );;
-gap>       end;;
-gap>     jac := Jacobian@FR( gens, problem.indeterminates );;
-gap>     jacobianAt := function ( point )
-gap>           return EvalPolynomialTensor@FR( jac, problem.indeterminates, point );;
-gap>       end;;
-gap>     solution := BlackBoxPadicLift@FR( evalIdealGens, jacobianAt, problem.solution, 3 );;
-gap>     Assert( 0, IsZero( evalIdealGens( solution ) ) );;
-#
-#
-# @PadicLift.Tests.TEST_LLL_REDUCTION : 
-#
-gap> 
-gap>     problem := CREATE_RATIONAL_TEST_PROBLEM@FR(  );;
-gap>     liftResult := PadicLift@FR( problem.ideal, problem.solution, 3 );;
-gap>     nextLiftResult := PadicLift@FR( problem.ideal, problem.solution, 4 );;
-gap>     gens := GeneratorsOfTwoSidedIdeal( problem.ideal );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, problem.indeterminates, liftResult ) ) );;
-gap>     Assert( 0, IsZero( EvalPolynomialTensor@FR( gens, problem.indeterminates, nextLiftResult ) ) );;
-gap>     reductionOpts := LiftOptions@FR(  );;
-gap>     LLL_REDUCTION_ATTEMPT@FR( problem.unknowns[1], problem.indeterminates, liftResult, nextLiftResult, reductionOpts );;
-#
-#
-# @PadicLift.Tests.TEST_COMPUTE_MINIMAL_POLYNOMIAL : 
-#
-gap> 
-gap>     problem := CREATE_RATIONAL_TEST_PROBLEM@FR(  );;
-gap>     options := LiftOptions@FR(  );;
-gap>     unknown := problem.indeterminates[1];;
-gap>     minimalPolynomialVariable := Indeterminate( Rationals );;
-gap>     liftAndLLLRes := ComputeMinimalPolynomialEx@FR( problem.ideal, problem.solution, unknown, minimalPolynomialVariable, options );;
-gap>     unknown := problem.indeterminates[2];;
-gap>     liftAndLLLRes := ComputeMinimalPolynomialEx@FR( problem.ideal, problem.solution, unknown, minimalPolynomialVariable, options );;
-#
-#
-# @PadicLift.Tests.TEST_COMPUTE_MINIMAL_POLYNOMIALS : 
-#
-gap> 
-gap>     liftAndLLLOptions := LiftOptions@FR(  );;
-gap>     problem := CREATE_RATIONAL_TEST_PROBLEM@FR(  );;
-gap>     x := problem.indeterminates[1];;
-gap>     y := problem.indeterminates[2];;
-gap>     liftAndLLLRes := ComputeMinimalPolynomials@FR( problem.ideal, problem.solution, problem.unknowns, liftAndLLLOptions );;
-gap>     expectedUnknowns := [ [ x, -11 * x ^ 2 - 21 * x - 1 ], [ y, y - 1 ] ];;
-gap>     expectedMergedLiftInfo := rec(
-gap>         dataType := "LiftInfo",
-gap>         maxLatticeDimension := 3,
-gap>         maxLiftDepth := 3,
-gap>         requiredLatticeDimension := 3 );;
-gap>     Assert( 0, liftAndLLLRes.unknowns = expectedUnknowns );;
-gap>     Assert( 0, liftAndLLLRes.mergedLiftInfo = expectedMergedLiftInfo );;
-#
-#
-# @PadicLift.Tests.TEST_COMPATIBILITY_ROWS_VALID : 
-#
-gap> 
-gap>     matrix := [ [ 0, 1 ], [ 2, 0 ], [ 0, 3 ] ];;
-gap>     Assert( 0, COMPATIBILITY_ROWS_VALID@FR( matrix, false ) );;
-gap>     Assert( 0, COMPATIBILITY_ROWS_VALID@FR( matrix, true ) );;
-gap>     matrix := [ [ 2, 1 ], [ 2, 0 ], [ 0, 3 ] ];;
-gap>     Assert( 0, COMPATIBILITY_ROWS_VALID@FR( matrix, false ) );;
-gap>     matrix := [ [ 2, 1 ], [ 2, 0 ], [ 0, 3 ] ];;
-gap>     Assert( 0, not COMPATIBILITY_ROWS_VALID@FR( matrix, true ) );;
-gap>     matrix := [ [ 2, 1 ], [ 0, 0 ], [ 0, 3 ] ];;
-gap>     Assert( 0, not COMPATIBILITY_ROWS_VALID@FR( matrix, true ) );;
-gap>     Assert( 0, not COMPATIBILITY_ROWS_VALID@FR( matrix, false ) );;
-#
-#
-# @PadicLift.Tests.TEST_IS_VALID_ROOT_COMPATIBILITY : 
-#
-gap> 
-gap>     logger := function ( a, b )
-gap>           return;;
-gap>       end;;
-gap>     matrix := [ [ 1, 2 ], [ 1, 4 ], [ 5, 6 ] ];;
-gap>     Assert( 0, false = IS_VALID_ROOT_COMPATIBILITY@FR( matrix, 6, logger ) );;
-gap>     matrix := [ [ 1, 2 ], [ 3, 4 ], [ 5, 6 ] ];;
-gap>     Assert( 0, true = IS_VALID_ROOT_COMPATIBILITY@FR( matrix, 6, logger ) );;
-gap>     Assert( 0, true = IS_VALID_ROOT_COMPATIBILITY@FR( matrix, 6, logger ) );;
-gap>     matrix := [ [ 1, 0 ], [ 3, 0 ], [ 2, 0 ] ];;
-gap>     Assert( 0, false = IS_VALID_ROOT_COMPATIBILITY@FR( matrix, 3, logger ) );;
-gap>     matrix := [ [ 1, 0 ], [ 0, 3 ], [ 2, 0 ] ];;
-gap>     Assert( 0, true = IS_VALID_ROOT_COMPATIBILITY@FR( matrix, 3, logger ) );;
-#
-#
-# @PadicLift.Tests.TEST_COMPUTE_ROOT_COMPATIBILITY : 
-#
-gap> 
-gap>     SetFloats( MPC, 1000 );;
-gap>     firstPolRoots := [ 0.03, 34.0, 10.0 ];;
-gap>     secondPolRoots := [ 5.03, 4.0, 1.0 ];;
-gap>     combinedPolRoots := [ 4.03, 11.0, 39.02 ];;
-gap>     operation := function ( a, b )
-gap>           return a + b;;
-gap>       end;;
-gap>     opts := LiftOptions@FR(  );;
-gap>     opts.setMaxPairingTolerance( 0.001 );;
-gap>     compatibility := COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR( firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts.maxPairingTolerance(  ), opts.logger );;
-gap>     Assert( 0, compatibility = fail );;
-gap>     opts := LiftOptions@FR(  );;
-gap>     opts.setMaxPairingTolerance( 0.02 );;
-gap>     opts.setVerbosePairing( false );;
-gap>     compatibility := COMPUTE_HURWITZ_ROOT_COMPATIBILITY@FR( firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts.maxPairingTolerance(  ), opts.logger );;
-gap>     Assert( 0, compatibility = [ [ 0, 1, 0 ], [ 1, 0, 0 ], [ 0, 0, 1 ] ] );;
-gap>     firstPolRoots := [ 4.0, 10.0 ];;
-gap>     secondPolRoots := [ 5.0 ];;
-gap>     combinedPolRoots := [ 9.0, 15.0 ];;
-gap>     compatibility := ComputeRootCompatibilityEx@FR( firstPolRoots, secondPolRoots, combinedPolRoots, operation, opts.maxPairingTolerance(  ), opts.logger );;
-gap>     Assert( 0, compatibility = [ [ 1 ], [ 2 ] ] );;
-#
-#
-# @PadicLift.Tests.TEST_COMPUTE_APPROX_IDEAL_POINTS : 
-#
-gap> 
-gap>     TestHelper := function ( problem )
-gap>           local  opts, gens, result, errorTolerance, evaluation, evaluationAbs, max, root;;
-gap>           opts := LiftOptions@FR(  );;
-gap>           result := ComputeApproxIdealPoints@FR( problem.ideal, problem.solution, opts );;
-gap>           gens := GeneratorsOfTwoSidedIdeal( problem.ideal );;
-gap>           errorTolerance := 1.e-14;;
-gap>           for root  in result.approxIdealElems  do
-gap>               evaluation := EvalPolynomialTensor@FR( gens, problem.indeterminates, root );;
-gap>               evaluationAbs := List( evaluation, function ( n )
-gap>                       return AbsoluteValue( n );;
-gap>                   end );;
-gap>               max := Maximum( evaluationAbs );;
-gap>               Assert( 0, max < errorTolerance );;
-gap>           od;;
-gap>           return;;
-gap>       end;;
-gap>     TestHelper( CREATE_RATIONAL_TEST_PROBLEM@FR(  ) );;
-gap>     TestHelper( CREATE_SYMM_TEST_PROBLEM@FR(  ) );;
-#
-#
-# @PadicLift.Tests.TEST_COMPUTE_HURWITZ_APPROX_IDEAL_POINT : 
-#
-gap> 
-gap>     problem := CREATE_RATIONAL_TEST_PROBLEM@FR(  );;
-gap>     opts := LiftOptions@FR(  );;
-gap>     result := COMPUTE_APPROX_HURWITZ_IDEAL_POINTS@FR( problem.ideal, problem.solution, opts );;
-gap>     gens := GeneratorsOfTwoSidedIdeal( problem.ideal );;
-gap>     errorTolerance := 1.e-14;;
-gap>     for root  in result.approxIdealElems  do
-gap>         evaluation := EvalPolynomialTensor@FR( gens, problem.indeterminates, root );;
-gap>         evaluationAbs := List( evaluation, function ( n )
-gap>                 return AbsoluteValue( n );;
-gap>             end );;
-gap>         max := Maximum( evaluationAbs );;
-gap>         Assert( 0, max < errorTolerance );;
-gap>     od;;
-#
-#
-# @PadicLift.Tests.TEST_COERCE_POLYNOMIAL_TO_COMPLEX_RING : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, 1 );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     pol := x ^ 2 + 3;;
-gap>     dstrng := PolynomialRing( MPC_PSEUDOFIELD, 1 );;
-gap>     coercedPol := CoercePolynomialTensor@FR( pol, dstrng );;
-gap>     dstInd := IndeterminatesOfPolynomialRing( dstrng );;
-gap>     expectedResult := dstInd[1] ^ 2 + 3.0_c;;
-gap>     Assert( 0, coercedPol = expectedResult );;
-
-
-
-#E padicLift.tst . . . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/hurwitz.kroeker/tst/utils.tst b/sandbox/hurwitz.kroeker/tst/utils.tst
deleted file mode 100644
index 55f2a30..0000000
--- a/sandbox/hurwitz.kroeker/tst/utils.tst
+++ /dev/null
@@ -1,238 +0,0 @@
-#############################################################################
-##
-#W  utils.tst                  FR Package               Jakob Kroeker
-##
-#H  @(#)$Id$
-##
-#Y  Copyright (C) 2012,  Laurent Bartholdi
-##
-#############################################################################
-##
-##  This file tests the polynomials and list utils for hurwitz package
-##
-#############################################################################
-
-# following lines generated with "str:= @FR@Utils.CreateTestString(true); Print(str);"
-#
-#
-#  @FR@Utils.Tests.TEST_FLATTEN_LIST : 
-#
-gap>     Assert( 0, [  ] = FlattenList@FR( [  ] ) );;
-gap>     Assert( 0, [ 1, 2, 1 ] = FlattenList@FR( [ 1, [ 2, 1 ] ] ) );;
-gap>     Assert( 0, [ 1, 2, [ 1 ] ] = FlattenList@FR( [ 1, [ 2, [ 1 ] ] ] ) );;
-gap>     Assert( 0, [ [ 1 ], 1 ] = FlattenList@FR( [ [  ], [ [ 1 ] ], 1 ] ) );;
-#
-#
-#  @FR@Utils.Tests.TEST_IS_MONOMIAL : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x", "y" ] );;
-gap>     indet := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indet[1];;
-gap>     y := indet[2];;
-gap>     Assert( 0, IsMonomial@FR( x ) );;
-gap>     Assert( 0, IsMonomial@FR( x * y ) );;
-gap>     Assert( 0, not IsMonomial@FR( 2 * x * y ) );;
-gap>     Assert( 0, not IsMonomial@FR( x + y ) );;
-gap>     Assert( 0, not IsMonomial@FR( 3 ) );;
-gap>     Assert( 0, not IsMonomial@FR( rng ) );;
-#
-#
-#  @FR@Utils.Tests.TEST_MONOMIAL_COEFFICIENT : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x", "y" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     y := indeterminates[2];;
-gap>     polynomial := (x ^ 4 - 4) ^ 3 * (4 * y ^ 2 + 2);;
-gap>     Assert( 0, Z( 11 ) ^ 4 = MonomialCoefficient@FR( polynomial, x ^ 4 * y ^ 2 ) );;
-gap>     Assert( 0, Zero( Z( 11 ) ) = MonomialCoefficient@FR( polynomial, x ^ 42 * y ^ 2 ) );;
-gap>     Assert( 0, Z( 11 ) ^ 2 = MonomialCoefficient@FR( polynomial, x ^ 0 * y ^ 0 ) );;
-#
-#
-#  @FR@Utils.Tests.TEST_COEFFICIENTS : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x", "y" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     y := indeterminates[2];;
-gap>     polynomial := (x ^ 4 - 4) ^ 3 * (4 * y ^ 2 + 2);;
-gap>     Assert( 0, [ Z( 11 ) ^ 4, Zero( Z( 11 ) ) ] = Coefficients@FR( polynomial, [ x ^ 4 * y ^ 2, x ^ 42 * y ^ 2 ] ) );;
-#
-#
-#  @FR@Utils.Tests.TEST_JACOBIAN : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, 2 );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     y := ind[2];;
-gap>     scalar := 5 / 3;;
-gap>     pol := scalar * x;;
-gap>     jacobian := Jacobian@FR( [ pol, y ^ 2 ], ind );;
-gap>     Assert( 0, jacobian = [ [ Derivative( pol, x ), Derivative( pol, y ) ], [ Derivative( y ^ 2, x ), Derivative( y ^ 2, y ) ] ] );;
-#
-#
-#  @FR@Utils.Tests.TEST_COERCE_SCALAR : 
-#
-gap> 
-gap>     scalar := 1 / 3;;
-gap>     dstRing := Integers;;
-gap>     dstRing := GF( 11 );;
-gap>     CoerceScalar@FR( scalar, dstRing );;
-gap>     dstRing := ZmodnZ( 11 );;
-gap>     Assert( 0, One( dstRing ) * scalar = CoerceScalar@FR( scalar, dstRing ) );;
-gap>     scalar := 23;;
-gap>     dstRing := Integers;;
-gap>     Assert( 0, One( dstRing ) * scalar = CoerceScalar@FR( scalar, dstRing ) );;
-gap>     dstRing := GF( 11 );;
-gap>     Assert( 0, One( dstRing ) * scalar = CoerceScalar@FR( scalar, dstRing ) );;
-gap>     dstRing := ZmodnZ( 121 );;
-gap>     Assert( 0, One( dstRing ) * scalar = CoerceScalar@FR( scalar, dstRing ) );;
-#
-#
-#  @FR@Utils.Tests.TEST_COERCE_POLYNOMIAL : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, 1 );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     scalar := 5 / 3;;
-gap>     pol := scalar * x;;
-gap>     baseField := ZmodnZ( 11 );;
-gap>     dstRng := PolynomialRing( baseField, 1 );;
-gap>     coercedPol := CoercePolynomial@FR( pol, dstRng );;
-gap>     dstInd := IndeterminatesOfPolynomialRing( dstRng );;
-gap>     expectedResult := dstInd[1] * Z( 11 ) ^ 6;;
-gap>     Assert( 0, coercedPol = expectedResult );;
-gap>     baseField := ZmodnZ( 121 );;
-gap>     dstRng := PolynomialRing( baseField, 1 );;
-gap>     coercedPol := CoercePolynomial@FR( pol, dstRng );;
-gap>     dstInd := IndeterminatesOfPolynomialRing( dstRng );;
-gap>     expectedResult := dstInd[1] * ZmodnZObj( 42, 121 );;
-gap>     Assert( 0, coercedPol = expectedResult );;
-gap>     CoerceScalar@FR( scalar, dstRng );;
-#
-#
-#  @FR@Utils.Tests.TEST_EVAL_POLYNOMIAL_TENSOR : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, 2 );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := ind[1];;
-gap>     y := ind[2];;
-gap>     mat := [ [ 1 / 3 * x ^ 0, x ^ 0, x + y ] ];;
-gap>     dstRng := ZmodnZ( 121 );;
-gap>     evaluatedTensor := EvalPolynomialTensor@FR( mat, [ x, y ], [ ZmodnZObj( 1, 121 ), ZmodnZObj( 2, 121 ) ] );;
-gap>     EvalPolynomialTensor@FR( mat, [ x, y ], [ ZmodnZObj( 1, 121 ), ZmodnZObj( 2, 121 ) ] );;
-#
-#
-#  @FR@Utils.Tests.TEST_SUBSTITUTE_POLYNOMIAL_COEFFICIENTS : 
-#
-gap> 
-gap>     rng := PolynomialRing( Rationals, 3 );;
-gap>     ind := IndeterminatesOfPolynomialRing( rng );;
-gap>     a := ind[1];;
-gap>     b := ind[2];;
-gap>     PREV_ITER_POLY_WARN := ITER_POLY_WARN;;
-gap>     ITER_POLY_WARN := false;;
-gap>     iterRng := PolynomialRing( rng, 2 );;
-gap>     ITER_POLY_WARN := PREV_ITER_POLY_WARN;;
-gap>     iterInd := IndeterminatesOfPolynomialRing( iterRng );;
-gap>     x := iterInd[1];;
-gap>     y := iterInd[2];;
-gap>     pol := a * b * x + b * y;;
-gap>     dstRng := PolynomialRing( Rationals, 2 );;
-gap>     dstFam := FamilyObj( One( dstRng ) );;
-gap>     result := SUBSTITUTE_POLYNOMIAL_COEFFICIENTS@FR( pol, ind, [ 2, 1, 0 ], dstFam );;
-gap>     Assert( 0, CoercePolynomial@FR( result, iterRng ) = CoercePolynomial@FR( 2 * x + y, iterRng ) );;
-#
-#
-#  @FR@Utils.Tests.TEST_COUNT_POLYNOMIAL_VARIABLES : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x", "y" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     y := indeterminates[2];;
-gap>     Assert( 0, CountPolynomialVariables@FR( y ) = 1 );;
-gap>     Assert( 0, CountPolynomialVariables@FR( x * y ) = 2 );;
-gap>     Assert( 0, CountPolynomialVariables@FR( x + y ) = 2 );;
-#
-#
-#  @FR@Utils.Tests.TEST_DISTINCT_MONIC_FACTORS : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     pol := 4 * (x - 3) ^ 10 * (3 * x - 2) ^ 3;;
-gap>     result := DistinctMonicFactors@FR( pol );;
-gap>     Assert( 0, result = [ x - 3, x - 8 ] );;
-gap>     pol := 4 * x ^ 0;;
-gap>     result := DistinctMonicFactors@FR( pol );;
-gap>     Assert( 0, Size( result ) = 0 );;
-#
-#
-#  @FR@Utils.Tests.TEST_PRODUCT_VALUE : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     product := [ [ 2, 3 ] ];;
-gap>     Assert( 0, 2 ^ 3 = PRODUCT_VALUE@FR( product ) );;
-gap>     product := [ [ x - 3, 3 ] ];;
-gap>     Assert( 0, (x - 3) ^ 3 = PRODUCT_VALUE@FR( product ) );;
-gap>     product := [ [ x - 3, 3 ], [ x, 2 ] ];;
-gap>     Assert( 0, (x - 3) ^ 3 * x ^ 2 = PRODUCT_VALUE@FR( product ) );;
-gap>     product := [  ];;
-gap>     Assert( 0, 1 = PRODUCT_VALUE@FR( product ) );;
-#
-#
-#  @FR@Utils.Tests.TEST_UNIQUE_PRODUCT : 
-#
-gap> 
-gap>     rng := PolynomialRing( ZmodnZ( 11 ), [ "x" ] );;
-gap>     indeterminates := IndeterminatesOfPolynomialRing( rng );;
-gap>     x := indeterminates[1];;
-gap>     pol := (x - 3) ^ 3;;
-gap>     result := UNIQUE_PRODUCT@FR( pol );;
-gap>     Assert( 0, result = [ [ x - 3, 3 ] ] );;
-gap>     pol := 3 * (x - 3) ^ 3;;
-gap>     result := UNIQUE_PRODUCT@FR( pol );;
-gap>     Assert( 0, result = [ [ x - 3, 3 ], [ One( rng ) * 3, 1 ] ] );;
-gap>     pol := (x - 3) ^ 3 * x ^ 2;;
-gap>     result := UNIQUE_PRODUCT@FR( pol );;
-gap>     expectedProduct := [ [ x, 2 ], [ x - 3, 3 ] ];;
-gap>     Assert( 0, expectedProduct = result );;
-gap>     pol := x ^ 0;;
-gap>     result := UNIQUE_PRODUCT@FR( pol );;
-gap>     expectedProduct := [  ];;
-gap>     Assert( 0, expectedProduct = result );;
-gap>     pol := 5 * x ^ 0;;
-gap>     result := UNIQUE_PRODUCT@FR( pol );;
-gap>     expectedProduct := [ [ One( rng ) * 5, 1 ] ];;
-gap>     Assert( 0, expectedProduct = result );;
-#
-#
-#  @FR@Utils.Tests.TEST_SORT_POWERS_BY_EXPONENT : 
-#
-gap> 
-gap>     factors := [ [ 3, 2 ], [ 3, 1 ], [ 4, 2 ], [ 3, 3 ] ];;
-gap>     sortedFactors := SORT_POWERS_BY_EXPONENT@FR( factors );;
-gap>     expectedResult := [ [ [ 3, 1 ] ], [ [ 3, 2 ], [ 4, 2 ] ], [ [ 3, 3 ] ] ];;
-gap>     Assert( 0, expectedResult = sortedFactors );;
-gap>     factors := [  ];;
-gap>     sortedFactors := SORT_POWERS_BY_EXPONENT@FR( factors );;
-gap>     expectedResult := [  ];;
-gap>     Assert( 0, expectedResult = sortedFactors );;
-
-
-
-
-
-
-#E utils.tst . . . . . . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/jars/vgpapp.jar b/sandbox/jars/vgpapp.jar
deleted file mode 100644
index 6b921b3..0000000
Binary files a/sandbox/jars/vgpapp.jar and /dev/null differ
diff --git a/sandbox/lay.m b/sandbox/lay.m
deleted file mode 100644
index 6b26b00..0000000
--- a/sandbox/lay.m
+++ /dev/null
@@ -1,334 +0,0 @@
-function [sph, edgelength, vt, u] = layout(inobj, outobj)
-%LAYOUT Flatten a 3D surface mesh discrete-conformally.
-%   [f, v, vt, u] = dcflatten(inobj) reads the file named inobj in
-%   alias/wavefront obj format and flattens it. Only lines beginning with
-%   'v ' or 'f ' are read, all other lines are ignored. The input mesh must
-%   be a triangulated surface which is a topological disc. The triangles 
-%   must be consistently oriented. Edges with length 0 are not allowed.
-%
-%   [f, v, vt, u] = dcflatten(inobj, outobj) writes the flat mesh as
-%   texture coordinates to outobj. Note that only f-lines, v-lines and
-%   vt-lines are written to outobj. All other data that might be contained 
-%   in inobj (such as normals) are not copied to outobj.
-% 
-%   The return values are:
-%
-%   f : an array of dimension (number of triangles) x 3. 
-%       f(m,n) is the index of the nth vertex in the mth triangle.
-%   v : an array of dimension (number of vertices) x 3.
-%       v(m,:) are the coordinates of the mth vertex of the original mesh.
-%   vt: an array of dimension (number of vertices) x 2.
-%       v(m,:) are the coordinates of the mth vertex of the flattened mesh.
-%   u : a vector of length (number of vertices).
-%       u(m) is the log scale factor at vertex number m. If an edge between
-%       vertices m and n has lenght l in the original mesh, then it has
-%       length l * exp(u(m) + u(n)) in the flat mesh.
-
-if nargin < 1
-    inobj = 'triangulation';
-end
-
-fid = fopen(inobj,'r');
-while true
-    switch fscanf(fid,'%s',1)
-        case 'VERTICES'
-            numvertices = fscanf(fid,'%d',1);
-            ivertex = fscanf(fid,'%d',1);
-        case 'FACES'
-            numfaces = fscanf(fid,'%d',1);
-        loglength = zeros(numfaces,3);
-	    f = zeros(numfaces,3);
-        for n = 1:numfaces
-            f(n,:) = fscanf(fid,'%d',3);
-            loglength(n,:) = reallog(fscanf(fid,'%f',3));
-        end
-        case ''
-            break
-    end
-end
-fclose(fid);
-
-if numfaces ~= 2*(numvertices-2)
-    fprintf(1, 'Error: numvertices = %d, numfaces = %d\n', numvertices, numfaces);
-end
-
-numangles = 3 * numfaces;
-
-boundaryvertices = false(numvertices,1);
-for n=1:numfaces
-    if ivertex==f(n,1) || ivertex==f(n,2) || ivertex==f(n,3)
-        boundaryvertices(f(n,:)) = true;       
-    end
-end
-interiorvertices = ~boundaryvertices;
-
-fprintf('infty=%d, %u boundary vertices, %u interior vertices.\n', ivertex, nnz(boundaryvertices), nnz(interiorvertices));
-
-%---- end of input changes (LB)
-
-% u_per_triangle is a (3 * numfaces) by numvertices matrix which is used to
-% distribute the u-values. u_per_triangles(m, n) is 1 if f(m) == n, otherwise 0. 
-% (Here, f is indexed as linear vector.)
-u_per_triangle = sparse(1 : numangles, f(:), ones(numangles,1), numangles, numvertices, numangles);
-% Allocate numfaces by 3 matrices which are used in dcfunctional.
-upt = zeros(numfaces, 3);
-angles = zeros(numfaces, 3);
-ct = zeros(numfaces, 3);
-
-% The following variables are used for the statistics that outfun displays.
-numbrokentriangs = uint32(0);
-
-% The discrete conformal functional with gradient and hessian.
-    function [grad, hess] = dcfunctional(u)
-        % Cout broken triangs for the statistics.
-        numbrokentriangs = 0;
-        % upt(m,n) is the u-value of the nth vertex in triangle n.
-        upt(:) = u_per_triangle * u;
-        % newloglenth(m,n) is the new logarithmic length of the edge
-        % opposite the nth vertex in the mth triangle.
-        newloglength = loglength + upt(:, [2, 3, 1]) + upt(:, [3, 1, 2]);
-        % angles(m,n) is the angle at the nth vertex of the mth triangle.
-        % ct(m,n) is the corresponding cotan (or zero if triangle is
-        % broken).
-        [angles(:, 1), angles(:, 2), angles(:, 3), ct(:, 1), ct(:, 2), ct(:, 3)] = ...
-            arrayfun(@triangle_angles, newloglength(:,1), newloglength(:,2), newloglength(:,3));
-        % Calculate the gradient.
-        grad = 2 * pi - (u_per_triangle' * angles(:));
-        % Build the Hessian.
-        ii = [f(:, 1);         f(:, 2);         f(:, 3);         f(:, 1);  f(:, 2);  f(:, 2);  f(:, 3);  f(:, 3);  f(:, 1)];
-        jj = [f(:, 1);         f(:, 2);         f(:, 3);         f(:, 2);  f(:, 1);  f(:, 3);  f(:, 2);  f(:, 1);  f(:, 3)];
-        hh = [ct(:,2)+ct(:,3); ct(:,3)+ct(:,1); ct(:,1)+ct(:,2); -ct(:,3); -ct(:,3); -ct(:,1); -ct(:,1); -ct(:,2); -ct(:, 2)];
-        hess = sparse(ii, jj, hh, numvertices, numvertices);
-    end
-
-    function [alpha, beta, gamma, cota, cotb, cotc] = triangle_angles(loga, logb, logc)
-        a = exp(loga);
-        b = exp(logb);
-        c = exp(logc);
-        s0 =  a + b + c;
-        s1 = -a + b + c;
-        s2 =  a - b + c;
-        s3 =  a + b - c;
-        if s1 <= 0 || s2 <= 0 || s3 <= 0
-            numbrokentriangs = numbrokentriangs + uint32(1);
-            alpha = pi * (s1 <= 0);
-            beta  = pi * (s2 <= 0);
-            gamma = pi * (s3 <= 0);
-            cota = 0;
-            cotb = 0;
-            cotc = 0;
-            return;
-        end
-        alpha = 2 * atan(realsqrt(s2 * s3 / (s1 * s0)));
-        beta  = 2 * atan(realsqrt(s3 * s1 / (s2 * s0)));
-        gamma = 2 * atan(realsqrt(s1 * s2 / (s3 * s0)));
-        p = 0.5 / realsqrt(s1 * s2 * s3 * s0);
-        cota = p * (s1 * s0 - s2 * s3);
-        cotb = p * (s2 * s0 - s3 * s1);
-        cotc = p * (s3 * s0 - s1 * s2);
-    end
-
-% allocate vector u used in targetfunction.
-u = zeros(numvertices,1);
-for n=1:numfaces
-    for m=1:3
-        if f(n,m)==ivertex
-            u(f(n,mod(m,3)+1)) = -loglength(n,mod(m+1,3)+1);
-        end
-    end
-end
-u(ivertex) = 0.;
-
-    % Clip boundaryvertices out of dcfunctional.
-    function [g, h] = targetfunction(x)
-        u(interiorvertices) = x;
-        [g, h] = dcfunctional(u);
-        g(boundaryvertices) = [];
-        h(:, boundaryvertices) = [];
-        h(boundaryvertices, :) = [];
-    end
-
-% Prepare for the minimization.
-xstart = zeros(nnz(interiorvertices), 1);
-
-% Set optimization options.
-options = optimset(...
-    'Jacobian', 'on', ...
-    'TolX', 0, ...
-    'Display', 'iter', ...
-    'Diagnostics', 'off');
-
-% Minimize!
-xsol = fsolve(@targetfunction, xstart, options); 
-u(interiorvertices) = xsol;
-
-% Don't need these anymore.
-clear upt u_per_triangle angles ct
-
-%%%%%%%%%%%%%%%%%%%%%%%
-% Lay out the flat mesh.
-
-% triangforedge(m, n) is the triang containing directed edge from vertex m
-% to vertex n, or 0 if no such edge exists.
-triangforedge = sparse([f(:,1), f(:,2), f(:,3)], ...
-                       [f(:,2), f(:,3), f(:,1)], ...
-                       [1:numfaces, 1:numfaces, 1:numfaces], numvertices, numvertices, 3 * numfaces);
-% edgelength(m, n) is the length of directed edge from vertex m to n.
-edgelength = sparse([f(:,1); f(:,2); f(:,3)], ...
-                    [f(:,2); f(:,3); f(:,1)], ...
-                    exp([loglength(:, 3) + u(f(:, 1)) + u(f(:, 2)); ...
-                         loglength(:, 1) + u(f(:, 2)) + u(f(:, 3)); ...
-                         loglength(:, 2) + u(f(:, 3)) + u(f(:, 1))]));
-% Allocate vt for vertex coordinates of flat mesh. Third coordinate is
-% zero. It is there because this facilitates displaying the flat mesh.
-vt = zeros(numvertices,3);
-
-% edgeslopte(m, n) is to hold the slope angle of directed edge from vertex
-% m to n.
-edgeslope = double(triangforedge | triangforedge'); % sparse matrix with given sparsity pattern.                     
-
-traversedualspanningtree(@travroot, @travleft, @travright);
-
-    function traversedualspanningtree(traverserootedge, traverseleftedge, traverserightedge)
-        % init edge queue
-        edgequeue.size = numfaces;
-        edgequeue.data = zeros([2, numfaces], 'uint32');
-        edgequeue.i1 = uint32(0);
-        edgequeue.i2 = uint32(0);
-
-        function pushedge(edge)
-            if edgequeue.i2 - edgequeue.i1 >= edgequeue.size
-                error('Edge queue is full.');
-            end
-            edgequeue.data(:, mod(edgequeue.i2, edgequeue.size) + 1) = edge;
-            edgequeue.i2 = edgequeue.i2 + 1;
-        end
-
-        function edge = popedge()
-            if edgequeue.i1 == edgequeue.i2
-                error('Edge queue is empty.');
-            end
-            edge = edgequeue.data(:, edgequeue.i1 + 1);
-            edgequeue.i1 = edgequeue.i1 + 1;
-            if edgequeue.i1 >= edgequeue.size
-                edgequeue.i1 = edgequeue.i1 - edgequeue.size;
-                edgequeue.i2 = edgequeue.i2 - edgequeue.size;
-            end
-        end
-
-        facetag = ~all(f'-ivertex);
-        
-        roottriang = find(~facetag,1);
-        rootedge = f(roottriang, [1,2]);
-        facetag(roottriang) = true;
-        pushedge(rootedge);
-        traverserootedge(rootedge);
-        oppedge = rootedge([2,1]);
-        oppface = triangforedge(oppedge(1), oppedge(2));
-        if (oppface > 0 && ~facetag(oppface))
-            facetag(oppface) = true;
-            pushedge(oppedge);
-        end
-
-        while edgequeue.i1 ~= edgequeue.i2 % edge queue not empty
-            edge = popedge();
-            face = triangforedge(edge(1), edge(2));
-            switch f(face, 1)
-                case edge(1)
-                    v3 = f(face, 3);
-                case edge(2)
-                    v3 = f(face, 2);
-                otherwise
-                    v3 = f(face, 1);
-            end
-            leftedge = [edge(1); v3];
-            leftface = triangforedge(leftedge(1), leftedge(2));
-            rightedge = [v3; edge(2)];
-            rightface = triangforedge(rightedge(1), rightedge(2));
-            if (leftface > 0 && ~facetag(leftface))
-                facetag(leftface) = true;
-                pushedge(leftedge);
-            end
-            traverseleftedge(leftedge, edge);
-            if (rightface > 0 && ~facetag(rightface))
-                facetag(rightface) = true;
-                pushedge(rightedge);
-            end
-            traverserightedge(rightedge, edge);
-        end
-    end
-
-    function travroot(edge)
-        i1 = edge(1);
-        i2 = edge(2);
-        edgeslope(i1, i2) = 0;
-        edgeslope(i2, i1) = pi;
-        x = edgelength(i1, i2);
-        vt(edge, :) = [0, 0, 0; 
-                       x, 0, 0];
-    end
-
-    function travleft(edge2, edge1)
-        i1 = edge1(1);
-        i2 = edge1(2);
-        i3 = edge2(2);
-
-        c = full(edgelength(i1, i2)); % without the full, realsqrt below complains.
-        a = full(edgelength(i2, i3));
-        b = full(edgelength(i3, i1));
-        alpha = 2 * atan(realsqrt(max((a - b + c) * (a + b - c) / ((-a + b + c) * (a + b + c)), 0)));
-        slope = edgeslope(i1, i2) + alpha;
-        edgeslope(i1, i3) = slope;
-        edgeslope(i3, i1) = slope - pi;
-        vt(i3, :) = vt(i1, :) + b * [cos(slope), sin(slope), 0];
-    end
-
-    function travright(edge2, edge1)
-        i1 = edge1(1);
-        i2 = edge1(2);
-        i3 = edge2(1);
-
-        c = full(edgelength(i1, i2)); % without the full, realsqrt below complains.
-        a = full(edgelength(i2, i3));
-        b = full(edgelength(i3, i1));
-        beta = 2 * atan(realsqrt(max((-a + b + c) * (a + b - c) / ((a - b + c) * (a + b + c)), 0)));
-        slope = edgeslope(i1, i2) - beta;
-        edgeslope(i3, i2) = slope;
-        edgeslope(i2, i3) = slope + pi;
-        vt(i3, :) = vt(i2, :) - a * [cos(slope), sin(slope), 0];
-    end
-
-% center points
-vt = vt - repmat(sum(vt)/numvertices,numvertices,1);
-ptnorm = vt(:,1).^2 + vt(:,2).^2 + 1.;
-sph = [2*vt(:,1)./ptnorm,2*vt(:,2)./ptnorm,(ptnorm-2.)./ptnorm];
-sph(ivertex,:) = [0.,0.,1.];
-
-if false % show the flat mesh.
-    figure();
-    patch('Vertices', vt, 'Faces', f, 'FaceColor', [0.9 0.9 0.9]);
-    axis equal;
-    axis off;
-    axis vis3d;  
-end
-
-if false % show the sphere.
-    figure();
-    patch('Vertices', sph, 'Faces', f, 'FaceColor', [0.9 0.9 0.9]);
-    axis equal;
-    axis off;
-    axis vis3d;  
-end
-
-% Write output obj file if 2nd filename was given as argument.
-if (nargin == 2) 
-    outfile = fopen(outobj, 'w');
-    fprintf(outfile, '[', numvertices);
-    for n = 1:numvertices
-        fprintf(outfile, '[%.15f,%.15f,%.15f],\n', sph(n, 1), sph(n, 2), sph(n,3));
-    end
-    fprintf(outfile, 'fail];\n');
-    fclose(outfile);
-end
-
-end % of function layout
\ No newline at end of file
diff --git a/sandbox/layout.m b/sandbox/layout.m
deleted file mode 100644
index 46e3953..0000000
--- a/sandbox/layout.m
+++ /dev/null
@@ -1,437 +0,0 @@
-function [sph, edgelength, vt, u] = layout(inobj, outobj)
-%DCFLATTEN Flatten a 3D surface mesh discrete-conformally.
-%   [f, v, vt, u] = dcflatten(inobj) reads the file named inobj in
-%   alias/wavefront obj format and flattens it. Only lines beginning with
-%   'v ' or 'f ' are read, all other lines are ignored. The input mesh must
-%   be a triangulated surface which is a topological disc. The triangles 
-%   must be consistently oriented. Edges with length 0 are not allowed.
-%
-%   [f, v, vt, u] = dcflatten(inobj, outobj) writes the flat mesh as
-%   texture coordinates to outobj. Note that only f-lines, v-lines and
-%   vt-lines are written to outobj. All other data that might be contained 
-%   in inobj (such as normals) are not copied to outobj.
-% 
-%   The return values are:
-%
-%   f : an array of dimension (number of triangles) x 3. 
-%       f(m,n) is the index of the nth vertex in the mth triangle.
-%   v : an array of dimension (number of vertices) x 3.
-%       v(m,:) are the coordinates of the mth vertex of the original mesh.
-%   vt: an array of dimension (number of vertices) x 2.
-%       v(m,:) are the coordinates of the mth vertex of the flattened mesh.
-%   u : a vector of length (number of vertices).
-%       u(m) is the log scale factor at vertex number m. If an edge between
-%       vertices m and n has lenght l in the original mesh, then it has
-%       length l * exp(u(m) + u(n)) in the flat mesh.
-
-if nargin < 1
-    inobj = 'tri448';
-end
-
-fid = fopen(inobj,'r');
-while true
-    switch fscanf(fid,'%s',1)
-        case 'VERTICES'
-            numvertices = fscanf(fid,'%d',1);
-            ivertex = fscanf(fid,'%d',1);
-        case 'FACES'
-            numfaces = fscanf(fid,'%d',1);
-        loglength = zeros(numfaces,3);
-	    f = zeros(numfaces,3);
-        for n = 1:numfaces
-            f(n,:) = fscanf(fid,'%d',3);
-            loglength(n,:) = reallog(fscanf(fid,'%f',3));
-        end
-        case ''
-            break
-    end
-end
-fclose(fid);
-
-if numfaces ~= 2*(numvertices-2)
-    fprintf(1, 'Error: numvertices = %d, numfaces = %d\n', numvertices, numfaces);
-end
-
-numangles = 3 * numfaces;
-
-boundaryvertices = false(numvertices,1);
-for n=1:numfaces
-    if ivertex==f(n,1) || ivertex==f(n,2) || ivertex==f(n,3)
-        boundaryvertices(f(n,:)) = true;       
-    end
-end
-interiorvertices = ~boundaryvertices;
-
-fprintf('infty=%d, %u boundary vertices, %u interior vertices.\n', ivertex, nnz(boundaryvertices), nnz(interiorvertices));
-
-%---- end of input changes (LB)
-
-% u_per_triangle is a (3 * numfaces) by numvertices matrix which is used to
-% distribute the u-values. u_per_triangles(m, n) is 1 if f(m) == n, otherwise 0. 
-% (Here, f is indexed as linear vector.)
-u_per_triangle = sparse(1 : numangles, f(:), ones(numangles,1), numangles, numvertices, numangles);
-% Allocate numfaces by 3 matrices which are used in dcfunctional.
-upt = zeros(numfaces, 3);
-angles = zeros(numfaces, 3);
-ct = zeros(numfaces, 3);
-
-% The following variables are used for the statistics that outfun displays.
-numbrokentriangs = uint32(0);
-thisfunctionvalue = 0;
-lastfunctionvalue = 0;
-
-% The discrete conformal functional with gradient and hessian.
-    function [val, grad, hess] = dcfunctional(u)
-        % Cout broken triangs for the statistics.
-        numbrokentriangs = 0;
-        % upt(m,n) is the u-value of the nth vertex in triangle n.
-        upt(:) = u_per_triangle * u;
-        % newloglenth(m,n) is the new logarithmic length of the edge
-        % opposite the nth vertex in the mth triangle.
-        newloglength = loglength + upt(:, [2, 3, 1]) + upt(:, [3, 1, 2]);
-        % angles(m,n) is the angle at the nth vertex of the mth triangle.
-        % ct(m,n) is the corresponding cotan (or zero if triangle is
-        % broken).
-        [angles(:, 1), angles(:, 2), angles(:, 3), ct(:, 1), ct(:, 2), ct(:, 3)] = ...
-            arrayfun(@triangle_angles, newloglength(:,1), newloglength(:,2), newloglength(:,3));
-        % Calculate the value of the functional.
-        val = 2 * pi * sum(u) + -pi * sum(upt(:)) + sum(angles(:) .* newloglength(:)) + 0.5 * sum(clausen(2 * angles(:)));
-        % Bookkeeping for the statistics
-        lastfunctionvalue = thisfunctionvalue;
-        thisfunctionvalue = val;
-        % Calculate the gradient.
-        grad = 2 * pi - (u_per_triangle' * angles(:));
-        % Build the Hessian.
-        ii = [ f(:, 1);  f(:, 2); f(:, 3); f(:, 1); f(:, 2); f(:, 2); f(:, 3); f(:, 3); f(:, 1)];
-        jj = [ f(:, 1);  f(:, 2); f(:, 3); f(:, 2); f(:, 1); f(:, 3); f(:, 2); f(:, 1); f(:, 3)];
-        hh = [ct(:, 2) + ct(:, 3); ...
-            ct(:, 3) + ct(:, 1); ...
-            ct(:, 1) + ct(:, 2); ...
-            -ct(:, 3); ...
-            -ct(:, 3); ...
-            -ct(:, 1); ...
-            -ct(:, 1); ...
-            -ct(:, 2); ...
-            -ct(:, 2)];
-        hess = sparse(ii, jj, hh, numvertices, numvertices);
-    end
-
-    function [alpha, beta, gamma, cota, cotb, cotc] = triangle_angles(loga, logb, logc)
-        a = exp(loga);
-        b = exp(logb);
-        c = exp(logc);
-        s0 =  a + b + c;
-        s1 = -a + b + c;
-        s2 =  a - b + c;
-        s3 =  a + b - c;
-        if s1 <= 0 || s2 <= 0 || s3 <= 0
-            numbrokentriangs = numbrokentriangs + uint32(1);
-            alpha = pi * (s1 <= 0);
-            beta  = pi * (s2 <= 0);
-            gamma = pi * (s3 <= 0);
-            cota = 0;
-            cotb = 0;
-            cotc = 0;
-            return;
-        end
-        alpha = 2 * atan(realsqrt(s2 * s3 / (s1 * s0)));
-        beta  = 2 * atan(realsqrt(s3 * s1 / (s2 * s0)));
-        gamma = 2 * atan(realsqrt(s1 * s2 / (s3 * s0)));
-        p = 0.5 / realsqrt(s1 * s2 * s3 * s0);
-        cota = p * (s1 * s0 - s2 * s3);
-        cotb = p * (s2 * s0 - s3 * s1);
-        cotc = p * (s3 * s0 - s1 * s2);
-    end
-
-% allocate vector u used in targetfunction.
-u = zeros(numvertices,1);
-for n=1:numfaces
-    for m=1:3
-        if f(n,m)==ivertex
-            u(f(n,mod(m,3)+1)) = -loglength(n,mod(m+1,3)+1);
-        end
-    end
-end
-u(ivertex) = 0.;
-
-    % Clip boundaryvertices out of dcfunctional.
-    function [y, g, h] = targetfunction(x)
-        u(interiorvertices) = x;
-        [y, g, h] = dcfunctional(u);
-        g(boundaryvertices) = [];
-        h(:, boundaryvertices) = [];
-        h(boundaryvertices, :) = [];
-    end
-
-% Prepare for the minimization.
-xstart = zeros(nnz(interiorvertices), 1);
-tolgrad = 1e-6;
-
-    % Output function which displays statistics and provides stopping criterion.
-    function stop = outfun(x, optimValues, state)
-        stop = false;
-        switch state
-            case 'init'
-                fprintf(1, '\n          func value    inf norm of                       broken       cg\n');  
-                fprintf(1,   'iter       increase      gradient      max x    min x    triangles    iter\n\n');
-            case 'iter'
-                fprintf('%4u    %12g    %11g    %5.1g    %5.1g    %5u       %4u\n', ...
-                        optimValues.iteration, ...
-                        thisfunctionvalue - lastfunctionvalue, ...
-                        optimValues.firstorderopt, ...
-                        max(x), ...
-                        min(x), ...
-                        numbrokentriangs, ...
-                        optimValues.cgiterations);
-                if (norm(optimValues.gradient, Inf) <= tolgrad)
-                    stop = true;
-                    fprintf(1, 'Max norm of gradient <= %g.\n\n', tolgrad);
-                end
-        end
-    end
-
-% Set optimization options. TolFun and TolX are set to 0 because stopping
-% criterion is provided by outfun.
-options = optimset(...
-    'GradObj', 'on', ...
-    'Hessian', 'on', ...
-    'LargeScale', 'on', ...
-    'DerivativeCheck', 'off', ...
-    'FunValCheck', 'on', ...
-    'TolFun', 0.0, ...
-    'TolX', 0, ... 
-    'TolPCG', 1.0e-3, ...
-    'PrecondBandWidth', Inf, ...
-    'OutputFcn', @outfun, ...
-    'Display', 'off', ...
-    'Diagnostics', 'off');
-% Minimize!
-[xsol] = fminunc(@targetfunction, xstart, options); 
-u(interiorvertices) = xsol;
-
-u
-
-% Don't need these anymore.
-clear upt u_per_triangle angles ct
-
-%%%%%%%%%%%%%%%%%%%%%%%
-% Lay out the flat mesh.
-
-% triangforedge(m, n) is the triang containing directed edge from vertex m
-% to vertex n, or 0 if no such edge exists.
-triangforedge = sparse([f(:,1), f(:,2), f(:,3)], ...
-                       [f(:,2), f(:,3), f(:,1)], ...
-                       [1:numfaces, 1:numfaces, 1:numfaces], numvertices, numvertices, 3 * numfaces);
-% edgelength(m, n) is the length of directed edge from vertex m to n.
-edgelength = sparse([f(:,1); f(:,2); f(:,3)], ...
-                    [f(:,2); f(:,3); f(:,1)], ...
-                    exp([loglength(:, 3) + u(f(:, 1)) + u(f(:, 2)); ...
-                         loglength(:, 1) + u(f(:, 2)) + u(f(:, 3)); ...
-                         loglength(:, 2) + u(f(:, 3)) + u(f(:, 1))]));
-% Allocate vt for vertex coordinates of flat mesh. Third coordinate is
-% zero. It is there because this facilitates displaying the flat mesh.
-vt = zeros(numvertices,3);
-
-% edgeslopte(m, n) is to hold the slope angle of directed edge from vertex
-% m to n.
-edgeslope = double(triangforedge | triangforedge'); % sparse matrix with given sparsity pattern.                     
-
-traversedualspanningtree(@travroot, @travleft, @travright);
-
-    function traversedualspanningtree(traverserootedge, traverseleftedge, traverserightedge)
-        % init edge queue
-        edgequeue.size = numfaces;
-        edgequeue.data = zeros([2, numfaces], 'uint32');
-        edgequeue.i1 = uint32(0);
-        edgequeue.i2 = uint32(0);
-
-        function pushedge(edge)
-            if edgequeue.i2 - edgequeue.i1 >= edgequeue.size
-                error('Edge queue is full.');
-            end
-            edgequeue.data(:, mod(edgequeue.i2, edgequeue.size) + 1) = edge;
-            edgequeue.i2 = edgequeue.i2 + 1;
-        end
-
-        function edge = popedge()
-            if edgequeue.i1 == edgequeue.i2
-                error('Edge queue is empty.');
-            end
-            edge = edgequeue.data(:, edgequeue.i1 + 1);
-            edgequeue.i1 = edgequeue.i1 + 1;
-            if edgequeue.i1 >= edgequeue.size
-                edgequeue.i1 = edgequeue.i1 - edgequeue.size;
-                edgequeue.i2 = edgequeue.i2 - edgequeue.size;
-            end
-        end
-
-        facetag = ~all(f'-ivertex);
-        
-        roottriang = find(~facetag,1);
-        rootedge = f(roottriang, [1,2]);
-        facetag(roottriang) = true;
-        pushedge(rootedge);
-        traverserootedge(rootedge);
-        oppedge = rootedge([2,1]);
-        oppface = triangforedge(oppedge(1), oppedge(2));
-        if (oppface > 0 && ~facetag(oppface))
-            facetag(oppface) = true;
-            pushedge(oppedge);
-        end
-
-        while edgequeue.i1 ~= edgequeue.i2 % edge queue not empty
-            edge = popedge();
-            face = triangforedge(edge(1), edge(2));
-            switch f(face, 1)
-                case edge(1)
-                    v3 = f(face, 3);
-                case edge(2)
-                    v3 = f(face, 2);
-                otherwise
-                    v3 = f(face, 1);
-            end
-            leftedge = [edge(1); v3];
-            leftface = triangforedge(leftedge(1), leftedge(2));
-            rightedge = [v3; edge(2)];
-            rightface = triangforedge(rightedge(1), rightedge(2));
-            if (leftface > 0 && ~facetag(leftface))
-                facetag(leftface) = true;
-                pushedge(leftedge);
-            end
-            traverseleftedge(leftedge, edge);
-            if (rightface > 0 && ~facetag(rightface))
-                facetag(rightface) = true;
-                pushedge(rightedge);
-            end
-            traverserightedge(rightedge, edge);
-        end
-    end
-
-    function travroot(edge)
-        i1 = edge(1);
-        i2 = edge(2);
-        edgeslope(i1, i2) = 0;
-        edgeslope(i2, i1) = pi;
-        x = edgelength(i1, i2);
-        vt(edge, :) = [0, 0, 0; 
-                       x, 0, 0];
-    end
-
-    function travleft(edge2, edge1)
-        i1 = edge1(1);
-        i2 = edge1(2);
-        i3 = edge2(2);
-
-        c = full(edgelength(i1, i2)); % without the full, realsqrt below complains.
-        a = full(edgelength(i2, i3));
-        b = full(edgelength(i3, i1));
-        alpha = 2 * atan(realsqrt(max((a - b + c) * (a + b - c) / ((-a + b + c) * (a + b + c)), 0)));
-        slope = edgeslope(i1, i2) + alpha;
-        edgeslope(i1, i3) = slope;
-        edgeslope(i3, i1) = slope - pi;
-        vt(i3, :) = vt(i1, :) + b * [cos(slope), sin(slope), 0];
-    end
-
-    function travright(edge2, edge1)
-        i1 = edge1(1);
-        i2 = edge1(2);
-        i3 = edge2(1);
-
-        c = full(edgelength(i1, i2)); % without the full, realsqrt below complains.
-        a = full(edgelength(i2, i3));
-        b = full(edgelength(i3, i1));
-        beta = 2 * atan(realsqrt(max((-a + b + c) * (a + b - c) / ((a - b + c) * (a + b + c)), 0)));
-        slope = edgeslope(i1, i2) - beta;
-        edgeslope(i3, i2) = slope;
-        edgeslope(i2, i3) = slope + pi;
-        vt(i3, :) = vt(i2, :) - a * [cos(slope), sin(slope), 0];
-    end
-
-vt
-
-% center points
-vt = vt - repmat(sum(vt)/numvertices,numvertices,1);
-ptnorm = vt(:,1).^2 + vt(:,2).^2 + 1.;
-sph = [2*vt(:,1)./ptnorm,2*vt(:,2)./ptnorm,(ptnorm-2.)./ptnorm];
-sph(ivertex,:) = [0.,0.,1.];
-
-if false % show the flat mesh.
-    figure();
-    patch('Vertices', vt, 'Faces', f, 'FaceColor', [0.9 0.9 0.9]);
-    axis equal;
-    axis off;
-    axis vis3d;  
-end
-
-if false % show the sphere.
-    figure();
-    patch('Vertices', sph, 'Faces', f, 'FaceColor', [0.9 0.9 0.9]);
-    axis equal;
-    axis off;
-    axis vis3d;  
-end
-
-% Don''t need the 3rd vt coordinate any longer.
-vt(:,3) = [];
-
-% Write output obj file if 2nd filename was given as argument.
-if (nargin == 2) 
-    outfile = fopen(outobj, 'w');
-    fprintf(outfile, '[', numvertices);
-    for n = 1:numvertices
-        fprintf(outfile, '[%.15f,%.15f,%.15f],\n', sph(n, 1), sph(n, 2), sph(n,3));
-    end
-    fprintf(outfile, 'fail];\n');
-    fclose(outfile);
-end
-
-end % of function dcflatten
-
-% SUBFUNCTIONS ----------------------------------------
-
-function y = clausen(x)
-%CLAUSEN Clausen''s integral
-
-% take equivalent x-value between -pi and pi
-x = mod(x + pi, 2 * pi) - pi;
-
-zerox = (x == 0);
-smallx = (~zerox & abs(x) <= 2.0944);
-bigx = ~(zerox | smallx);
-
-x(bigx) = x(bigx) - pi * sign(x(bigx));
-xx = x .* x;
-
-y = zeros(size(x));
-
-y(smallx) = ((((((((((((                    ...
-    2.3257441143020875e-22 * xx(smallx)     ...
-    + 1.0887357368300848e-20) .* xx(smallx)  ...
-    + 5.178258806090624e-19) .* xx(smallx)   ...
-    + 2.5105444608999545e-17) .* xx(smallx)  ...
-    + 1.2462059912950672e-15) .* xx(smallx)  ...
-    + 6.372636443183181e-14) .* xx(smallx)   ...
-    + 3.387301370953521e-12) .* xx(smallx)   ...
-    + 1.8978869988971e-10) .* xx(smallx)     ...
-    + 1.1482216343327455e-8) .* xx(smallx)   ...
-    + 7.873519778281683e-7) .* xx(smallx)    ...
-    + 0.00006944444444444444) .* xx(smallx)  ...
-    + 0.013888888888888888) .* xx(smallx)    ...
-    - reallog(abs(x(smallx))) + 1.0) .* x(smallx);
-
-y(bigx) = ((((((((((((                                ...
-				  3.901950904063069e-15 * xx(bigx)    ...
-				+ 4.566487567193635e-14) .* xx(bigx)   ...
-				+ 5.429792727596476e-13) .* xx(bigx)   ...
-				+ 6.5812165661369675e-12) .* xx(bigx)  ...
-				+ 8.167010963952222e-11) .* xx(bigx)   ...
-				+ 1.0440290284867003e-9) .* xx(bigx)   ...
-				+ 1.3870999114054669e-8) .* xx(bigx)   ...
-				+ 1.941538399871733e-7) .* xx(bigx)    ...
-				+ 2.927965167548501e-6) .* xx(bigx)    ...
-				+ 0.0000496031746031746) .* xx(bigx)   ...
-				+ 0.0010416666666666667) .* xx(bigx)   ...
-				+ 0.041666666666666664) .* xx(bigx)    ...
-				+ -0.693147180559945) .* x(bigx);
-            
-end % of function clausen
diff --git a/sandbox/new.g b/sandbox/new.g
deleted file mode 100755
index 267c0ae..0000000
--- a/sandbox/new.g
+++ /dev/null
@@ -1,215 +0,0 @@
-#!/bin/sh
-tail -n +4 $0 | pargap -r -q > log.$$ 2>&1
-exit
-################################################################
-# Compute images, in parameter space, of Misiurewicz points,
-# or of matings of Misiurewicz polynomials with rabbit/corabbit/airplane
-#
-mindenom := 8; # minimal denominator; all i/mindenom will be computed
-maxdenom := 2^14; # maximal denominator
-mindist := 1/10; # subdivide as long as denominator is small enough and
-                 # distance between neighbouring points is >mindist
-type := "airplane";
-
-maxpcset := 16; # maximal number of post-critical points
-################################################################
-
-#ParReset();
-ParEval("LoadPackage(\"fr\")");
-#ParEval("SetInfoLevel(InfoFR,2)");
-ParEval("EPS@fr.maxratio := MacFloat(16/10)");
-
-################################################################
-ParInstallTOPCGlobalFunction("makemeone", function(mindenom,maxdenom,mindist,maxpcset,type)
-    local points, i, j, idle, c2i, i2c, obstructed, task, angle2, job;
-    
-    c2i := function(c)
-        if IsInt(c) then return c; fi;
-        return [Int(10^10*RealPart(c)),Int(10^10*ImaginaryPart(c))];
-    end;
-    i2c := function(i)
-        if IsInt(i) then return i; fi;
-        return Complex(i[1]/10^10,i[2]/10^10);
-    end;
-    MakeReadWriteGlobal("ErrorInner");
-    ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-    if type="mandelbrot" then
-	task := function(angle)
-            local v;
-            v := CALL_WITH_CATCH(RationalFunction,[PolynomialIMGMachine(2,[angle],false)]:param_unicritical);
-	    if not v[1] then # gap error
-		return 1;
-	    elif IsRationalFunction(v[2]) then # z^2+c
-		return c2i(Value(v[2],0));
-	    elif IsRecord(v[2]) then # obstruction
-		return 0;
-	    else # fr error
-		return 1;
-	    fi;
-	end;
-    else # points in slice v3
-        if type="rabbit" then
-            angle2 := 1/7;
-        elif type="airplane" then
-            angle2 := 3/7;
-        elif type="corabbit" then
-            angle2 := 5/7;
-        fi;
-        obstructed := [1-angle2-1/7,1-angle2];
-        task := function(angle)
-            local v;
-	    if angle >= obstructed[1] and angle <= obstructed[2] then
-		return 0; # we know it's an obstruction
-	    fi;
-	    RUNTIME@fr := Runtime() + 3600*1000; # allow 1 hour
-            v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[angle2]))]:param_v:=3);
-	    Info(InfoFR,1,"Spider converged to ",v," on ",MPI_Comm_rank());
-            if not v[1] then
-                return 1; # gap error
-            elif IsRationalFunction(v[2]) then # 1 - (1+a)z^-1 + az^-2
-                return c2i(CoefficientsOfUnivariateLaurentPolynomial(v[2])[1][1]);
-            elif IsRecord(v[2]) then
-		return 0; # obstruction
-	    else
-                return 1; # fr error
-            fi;
-        end;
-    fi;
-
-    points := [];
-
-    job := [];
-    # classical job
-    for i in Combinations([0..maxpcset],2) do
-	j := 2^i[2]-2^i[1];
-	Append(job,[0..j-1]/j);
-    od;
-    j := AsSortedList(job);
-    job := [];
-    for i in [1..Length(j)] do
-	if i=1 or j[i]<>j[i-1] then
-	    Add(job,j[i]);
-	fi;
-    od;
-
-    # Hamal Hubbard's question: only points in [2/7,1/3]
-    if true then
-	job := Filtered(job,angle->IsEvenInt(DenominatorRat(angle)) and angle >= 2/7 and angle <= 1/3);
-    fi;
-
-    # Xavier Buff's question: real polynomials with rabbit
-    if false then
-    fi;
-
-    MasterSlave(function() # iterator
-        local i, new;
-
-	if IsBound(job) then
-	    if job=[] then
-		return NOTASK;
-	    else
-		i := Remove(job,1);
-		Add(points,[i,fail]);
-		return i;
-	    fi;
-	fi;
-
-        i := Length(points);
-        if i=0 then
-            Add(points,[0,fail]);
-            return 0;
-        fi;
-        if points[i][1]<1 and IsInt(mindenom*points[i][1]) then
-            Add(points,[points[i][1]+1/mindenom,fail]);
-            return points[i+1][1];
-        fi;
-	i := 2; while i <= Length(points) do
-            if ForAll(points{[i-1,i]},p->DenominatorRat(p[1])<maxdenom and p[2]<>fail) then # something to subdivide
-                if false and IS_COMPLEX(points[i-1][2]) and IS_COMPLEX(points[i][2]) and AbsoluteValue(points[i][2]-points[i-1][2])<mindist then
-		    i := i+1;
-		    continue;
-		fi; # don't waste time here, points are very close
-		new := (points[i-1][1]+points[i][1])/2;
-                Add(points,[new,fail],i);
-                return new; # new task
-            fi;
-	    i := i+1;
-        od;
-        return NOTASK; # done
-    end,
-    task, # task
-      function(input,output) # check result, save locally
-        points[PositionProperty(points,x->x[1]=input)][2] := i2c(output);
-	Info(InfoFR,1,input," gives ",output," ",i2c(output));
-        return NO_ACTION;
-    end,
-      Error); # update data
-
-    return points;
-end);
-
-################################################################
-points := makemeone(mindenom,maxdenom,mindist,maxpcset,type);
-
-file := Concatenation(type,"-",String(maxpcset));
-PrintTo(file,"# gnuplot data -- maxpcset=",maxpcset," type=",type,"\n");
-#file := Concatenation(type,"-",String(maxdenom));
-#PrintTo(file,"# gnuplot data -- maxdenom=",mindenom," maxdenom=",maxdenom," mindist=",mindist," type=",type,"\n");
-lastinfinity := true;
-for i in [1..Length(points)] do
-    if IsInt(points[i][2]) then
-	real := infinity;
-	imag := infinity;
-	lastinfinity := true;
-    else
-	if not lastinfinity and AbsoluteValue(points[i-1][2]-points[i][2])>10*mindist then
-	    AppendTo(file,"infinity\t0\n"); # a jump in gnuplot
-	fi;
-	real := RealPart(points[i][2]);
-	imag := ImaginaryPart(points[i][2]);
-	lastinfinity := false;
-    fi;
-    AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(6,MacFloat(points[i][1])),"\n");
-od;
-# hubbard.g . . . . . . . . . . . . . . . . . . . . . . . . . ends here
-# recover angles:
-# awk '$1=="master" {n=substr($3,1,length($3)-1); angle[n]=$4; split($4,a,"/"); if(length(a)==1)a[2]=1; angleval[n]=1.0*a[1]/a[2]} $3=="master:" {if(NF==7){printf "%.10g\t%.10g\t%s\t%g\n",substr($5,1,length($5)-1)/10000000000.0,$6/10000000000.0,angle[$1],angleval[$1]}else{print "infinity\tinfinity\t" angle[$1] "\t" angleval[$1]}}' < log.
-# awk '{split($3,a,"/");if(a[2]==0)a[2]=1;b=a[1]*16384/a[2];seen[b]++} END{for(i=1;i<=11702;i++) if(seen[i]!=1) print i ",";for(i=14043;i<=16384;i++) if(seen[i]!=1) print i ","}' < rabbit-temp >
-
-if false then
-
-MakeReadWriteGlobal("ErrorInner");
-ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-
-hard := [8199, 8850, 9349, 9457, 9785, 9800, 10508, 10628, 10822,
-11279, 11308, 11573, 11618, 11690, 14082, 14139, 14211, 14383,
-14457, 14685, 14779, 15085, 15700];
-
-points := [];
-
-for angle in angles2 do
-  v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[1/7]))]:param_v:=3);
-  Info(InfoFR,1,"Angle ",angle,": spider converged to ",v);
-  Add(points,[angle,v]);
-od;
-
-file := "xx";
-PrintTo(file,"");
-for i in [1..Length(points)] do
-real := STRING_DIGITS_MACFLOAT(10,RealPart(points[i][2]));
-imag := STRING_DIGITS_MACFLOAT(10,ImaginaryPart(points[i][2]));
-AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(6,MacFloat(points[i][1])),"\n");
-od;
-
-# plot [300:1200] [200:700] '< convert -negate -modulate 200 ~/math/GAP/fr/sandbox/v3.jpg avs:-' binary filetype=avs with rgbimage, '~/math/GAP/fr/sandbox/airplane-4096' using (-($1+7.15)*40+700):(-$2*160+450) with lines
-fi;
-a2c(x,y) = 2*(x+{0,1}*y)/(x+{0,1}*y+1)
-
-plot [-0.7:3.75] [-1.98:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'airplane-13'  using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'rabbit-11-16384'  using (real(a2c($1,-$2))):(imag(a2c($1,-$2))) with lines
-set term pdfcairo size 29.7cm,21cm
-set out "wittner.pdf"
-replot
-set term png size 1112,990
-set out "wittner.png"
-replot
-plot [0.43:1.9] [0.5:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):($4 > 0.33333 && $4 < 0.666666 ? imag(a2c($1,$2)):1/0):(150+($4-0.333333)*150*3) with lines linew 2.0 palette,'airplane-13'  using (real(a2c($1,$2))):($4 > 0.142857 && $4 < 0.285715 ? imag(a2c($1,$2)):1/0):(30+($4-0.142857)*120*7) with lines linew 2.0 palette
diff --git a/sandbox/poly/complex_roots.py b/sandbox/poly/complex_roots.py
deleted file mode 100644
index f330a3b..0000000
--- a/sandbox/poly/complex_roots.py
+++ /dev/null
@@ -1,377 +0,0 @@
-"""
-Isolate Complex Roots of Polynomials
-
-AUTHOR:
-
-- Carl Witty (2007-11-18): initial version
-
-This is an implementation of complex root isolation.  That is, given a
-polynomial with exact complex coefficients, we compute isolating
-intervals for the complex roots of the polynomial.  (Polynomials with
-integer, rational, Gaussian rational, or algebraic coefficients are
-supported.)
-
-We use a simple algorithm.  First, we compute a squarefree decomposition
-of the input polynomial; the resulting polynomials have no multiple roots.
-Then, we find the roots numerically, using NumPy (at low precision) or
-Pari (at high precision).  Then, we verify the roots using interval
-arithmetic.
-
-EXAMPLES::
-
-    sage: x = polygen(ZZ)
-    sage: (x^5 - x - 1).roots(ring=CIF)
-    [(1.167303978261419?, 1), (-0.764884433600585? - 0.352471546031727?*I, 1), (-0.764884433600585? + 0.352471546031727?*I, 1), (0.181232444469876? - 1.083954101317711?*I, 1), (0.181232444469876? + 1.083954101317711?*I, 1)]
-"""
-
-from copy import copy
-
-from sage.rings.real_mpfi import RealIntervalField
-from sage.rings.complex_field import ComplexField
-from sage.rings.complex_interval_field import ComplexIntervalField
-from sage.rings.qqbar import AA, QQbar
-from sage.rings.arith import sort_complex_numbers_for_display
-
-def refine_root(ip, ipd, irt, fld):
-    """
-    We are given a polynomial and its derivative (with complex
-    interval coefficients), an estimated root, and a complex interval
-    field to use in computations.  We use interval arithmetic to
-    refine the root and prove that we have in fact isolated a unique
-    root.
-
-    If we succeed, we return the isolated root; if we fail, we return
-    None.
-
-    EXAMPLES::
-
-        sage: from sage.rings.polynomial.complex_roots import *
-        sage: x = polygen(ZZ)
-        sage: p = x^9 - 1
-        sage: ip = CIF['x'](p); ip
-        x^9 - 1
-        sage: ipd = CIF['x'](p.derivative()); ipd
-        9*x^8
-        sage: irt = CIF(CC(cos(2*pi/9), sin(2*pi/9))); irt
-        0.76604444311897802? + 0.64278760968653926?*I
-        sage: ip(irt)
-        0.?e-14 + 0.?e-14*I
-        sage: ipd(irt)
-        6.89439998807080? - 5.78508848717885?*I
-        sage: refine_root(ip, ipd, irt, CIF)
-        0.766044443118978? + 0.642787609686540?*I
-    """
-
-    # There has got to be a better way to do this, but I don't know
-    # what it is...
-
-    # We start with a basic fact: if we do an interval Newton-Raphson
-    # step, and the refined interval is contained in the original interval,
-    # then the refined interval contains exactly one root.
-
-    # Unfortunately, our initial estimated root almost certainly does not
-    # contain the actual root (our initial interval is a point, which
-    # is exactly equal to whatever floating-point estimate we got from
-    # the external solver).  So we need to do multiple Newton-Raphson
-    # steps, and check this inclusion property on each step.
-
-    # After a few steps of refinement, if the initial root estimate was
-    # close to a root, we should have an essentially perfect interval
-    # bound on the root (since Newton-Raphson has quadratic convergence),
-    # unless either the real or imaginary component of the root is zero.
-    # If the real or imaginary component is zero, then we could spend
-    # a long time computing closer and closer approximations to that
-    # component.  (This doesn't happen for non-zero components, because
-    # of the imprecision of floating-point numbers combined with the
-    # outward interval rounding; but close to zero, MPFI provides
-    # extremely precise numbers.)
-
-    # If the root is actually a real root, but we start with an imaginary
-    # component, we can bounce back and forth between having a positive
-    # and negative imaginary component, without ever hitting zero.
-    # To deal with this, on every other Newton-Raphson step, instead of
-    # replacing the old interval with the new one, we take the union.
-
-    # If the containment check continues to fail many times in a row,
-    # we give up and return None; we also return None if we detect
-    # that the slope in our current interval is not bounded away
-    # from zero at any step.
-
-    # After every refinement step, we check to see if the real or
-    # imaginary component of our interval includes zero.  If so, we
-    # try setting it to exactly zero.  This gives us a good chance of
-    # detecting real roots.  However, we do this replacement at most
-    # once per component.
-
-    refinement_steps = 10
-
-    smashed_real = False
-    smashed_imag = False
-
-    for i in range(refinement_steps):
-        slope = ipd(irt)
-        if slope.contains_zero():
-            return None
-        center = fld(irt.center())
-        val = ip(center)
-
-        nirt = center - val / slope
-        # print irt, nirt, (nirt in irt), nirt.diameter(), irt.diameter(), center, val, slope
-        if nirt in irt and (nirt.diameter() >= irt.diameter() >> 3 or i >= 8):
-            # If the new diameter is much less than the original diameter,
-            # then we have not yet converged.  (Perhaps we were asked
-            # for a particularly high-precision result.)  So we don't
-            # return yet.
-            return nirt
-
-        if i & 1:
-            irt = nirt
-        else:
-            irt = irt.union(nirt)
-            # If we don't find a root after a while, try (approximately)
-            # tripling the size of the region.
-            if i >= 6:
-                rD = irt.real().absolute_diameter()
-                iD = irt.imag().absolute_diameter()
-                md = max(rD, iD)
-                md_intv = RealIntervalField(rD.prec())(-md, md)
-                md_cintv = ComplexIntervalField(rD.prec())(md_intv, md_intv)
-                irt = irt + md_cintv
-
-        if not smashed_real and irt.real().contains_zero():
-            irt = irt.parent()(0, irt.imag())
-            smashed_real = True
-        if not smashed_imag and irt.imag().contains_zero():
-            irt = irt.parent()(irt.real(), 0)
-            smashed_imag = True
-
-    return None
-
-def interval_roots(p, rts, prec):
-    """
-    We are given a squarefree polynomial p, a list of estimated roots,
-    and a precision.
-
-    We attempt to verify that the estimated roots are in fact distinct
-    roots of the polynomial, using interval arithmetic of precision prec.
-    If we succeed, we return a list of intervals bounding the roots; if we
-    fail, we return None.
-
-    EXAMPLES::
-
-        sage: x = polygen(ZZ)
-        sage: p = x^3 - 1
-        sage: rts = [CC.zeta(3)^i for i in range(0, 3)]
-        sage: from sage.rings.polynomial.complex_roots import interval_roots
-        sage: interval_roots(p, rts, 53)
-        [1, -0.500000000000000? + 0.866025403784439?*I, -0.500000000000000? - 0.866025403784439?*I]
-        sage: interval_roots(p, rts, 200)
-        [1, -0.500000000000000000000000000000000000000000000000000000000000? + 0.866025403784438646763723170752936183471402626905190314027904?*I, -0.500000000000000000000000000000000000000000000000000000000000? - 0.866025403784438646763723170752936183471402626905190314027904?*I]
-    """
-
-    CIF = ComplexIntervalField(prec)
-    CIFX = CIF['x']
-
-    ip = CIFX(p)
-    ipd = CIFX(p.derivative())
-
-    irts = []
-
-    for rt in rts:
-        irt = refine_root(ip, ipd, CIF(rt), CIF)
-        if irt is None:
-            return None
-        irts.append(irt)
-
-    return irts
-
-def intervals_disjoint(intvs):
-    """
-    Given a list of complex intervals, check whether they are pairwise
-    disjoint.
-
-    EXAMPLES::
-
-        sage: from sage.rings.polynomial.complex_roots import intervals_disjoint
-        sage: a = CIF(RIF(0, 3), 0)
-        sage: b = CIF(0, RIF(1, 3))
-        sage: c = CIF(RIF(1, 2), RIF(1, 2))
-        sage: d = CIF(RIF(2, 3), RIF(2, 3))
-        sage: intervals_disjoint([a,b,c,d])
-        False
-        sage: d2 = CIF(RIF(2, 3), RIF(2.001, 3))
-        sage: intervals_disjoint([a,b,c,d2])
-        True
-    """
-
-    # This may be quadratic in perverse cases, but will take only
-    # n log(n) time in typical cases.
-
-    intvs = copy(intvs)
-    intvs.sort()
-
-    column = []
-    prev_real = None
-
-    def column_disjoint():
-        column.sort()
-
-        row = []
-        prev_imag = None
-
-        def row_disjoint():
-            for a in range(len(row)):
-                for b in range(a+1, len(row)):
-                    if row[a].overlaps(row[b]):
-                        return False
-            return True
-
-        for (y_imag, y) in column:
-            if prev_imag is not None and y_imag > prev_imag:
-                if not row_disjoint(): return False
-                row = []
-            prev_imag = y_imag
-            row.append(y)
-        if not row_disjoint(): return False
-        return True
-
-    for x in intvs:
-        x_real = x.real()
-        if prev_real is not None and x_real > prev_real:
-            if not column_disjoint(): return False
-            column = []
-        prev_real = x_real
-        column.append((x.imag(), x))
-
-    if not column_disjoint(): return False
-    return True
-            
-    
-
-def complex_roots(p, skip_squarefree=False, retval='interval', min_prec=0):
-    """
-    Compute the complex roots of a given polynomial with exact
-    coefficients (integer, rational, Gaussian rational, and algebraic
-    coefficients are supported).  Returns a list of pairs of a root
-    and its multiplicity.
-
-    Roots are returned as a ComplexIntervalFieldElement; each interval
-    includes exactly one root, and the intervals are disjoint.
-
-    By default, the algorithm will do a squarefree decomposition
-    to get squarefree polynomials.  The skip_squarefree parameter
-    lets you skip this step.  (If this step is skipped, and the polynomial
-    has a repeated root, then the algorithm will loop forever!)
-
-    You can specify retval='interval' (the default) to get roots as
-    complex intervals.  The other options are retval='algebraic' to
-    get elements of QQbar, or retval='algebraic_real' to get only
-    the real roots, and to get them as elements of AA.
-
-    EXAMPLES::
-
-        sage: from sage.rings.polynomial.complex_roots import complex_roots
-        sage: x = polygen(ZZ)
-        sage: complex_roots(x^5 - x - 1)
-        [(1.167303978261419?, 1), (-0.764884433600585? - 0.352471546031727?*I, 1), (-0.764884433600585? + 0.352471546031727?*I, 1), (0.181232444469876? - 1.083954101317711?*I, 1), (0.181232444469876? + 1.083954101317711?*I, 1)]
-        sage: v=complex_roots(x^2 + 27*x + 181)
-
-    Unfortunately due to numerical noise there can be a small imaginary part to each 
-    root depending on CPU, compiler, etc, and that affects the printing order. So we 
-    verify the real part of each root and check that the imaginary part is small in 
-    both cases::
-
-        sage: v # random
-        [(-14.61803398874990?..., 1), (-12.3819660112501...? + 0.?e-27*I, 1)]
-        sage: sorted((v[0][0].real(),v[1][0].real()))
-        [-14.61803398874989?, -12.3819660112501...?]
-        sage: v[0][0].imag() < 1e25
-        True
-        sage: v[1][0].imag() < 1e25
-        True
-
-        sage: K.<im> = NumberField(x^2 + 1)
-        sage: eps = 1/2^100
-        sage: x = polygen(K)
-        sage: p = (x-1)*(x-1-eps)*(x-1+eps)*(x-1-eps*im)*(x-1+eps*im)
-
-    This polynomial actually has all-real coefficients, and is very, very
-    close to (x-1)^5::
-
-        sage: [RR(QQ(a)) for a in list(p - (x-1)^5)]
-        [3.87259191484932e-121, -3.87259191484932e-121]
-        sage: rts = complex_roots(p)
-        sage: [ComplexIntervalField(10)(rt[0] - 1) for rt in rts]
-        [-7.8887?e-31, 0, 7.8887?e-31, -7.8887?e-31*I, 7.8887?e-31*I]
-
-    We can get roots either as intervals, or as elements of QQbar or AA.
-
-    ::
-
-        sage: p = (x^2 + x - 1)
-        sage: p = p * p(x*im)
-        sage: p
-        -x^4 + (im - 1)*x^3 + im*x^2 + (-im - 1)*x + 1
-
-    Two of the roots have a zero real component; two have a zero
-    imaginary component.  These zero components will be found slightly
-    inaccurately, and the exact values returned are very sensitive to
-    the (non-portable) results of NumPy.  So we post-process the roots
-    for printing, to get predictable doctest results.
-
-    ::
-
-        sage: def tiny(x):
-        ...       return x.contains_zero() and x.absolute_diameter() <  1e-14
-        sage: def smash(x):
-        ...       x = CIF(x[0]) # discard multiplicity
-        ...       if tiny(x.imag()): return x.real()
-        ...       if tiny(x.real()): return CIF(0, x.imag())
-        sage: rts = complex_roots(p); type(rts[0][0]), sorted(map(smash, rts))
-        (<type 'sage.rings.complex_interval.ComplexIntervalFieldElement'>, [-1.618033988749895?, -0.618033988749895?*I, 1.618033988749895?*I, 0.618033988749895?])
-        sage: rts = complex_roots(p, retval='algebraic'); type(rts[0][0]), sorted(map(smash, rts))
-        (<class 'sage.rings.qqbar.AlgebraicNumber'>, [-1.618033988749895?, -0.618033988749895?*I, 1.618033988749895?*I, 0.618033988749895?])
-        sage: rts = complex_roots(p, retval='algebraic_real'); type(rts[0][0]), rts
-        (<class 'sage.rings.qqbar.AlgebraicReal'>, [(-1.618033988749895?, 1), (0.618033988749895?, 1)])
-    """
-
-    if skip_squarefree:
-        factors = [(p, 1)]
-    else:
-        factors = p.squarefree_decomposition()
-
-    prec = 53
-    while True:
-        CC = ComplexField(prec)
-        CCX = CC['x']
-
-        all_rts = []
-        ok = True
-
-        for (factor, exp) in factors:
-            cfac = CCX(factor)
-            rts = cfac.roots(multiplicities=False)
-            irts = interval_roots(factor, rts, max(prec, min_prec))
-            if irts is None:
-                ok = False
-                break
-            if retval != 'interval':
-                factor = QQbar.common_polynomial(factor)
-            for irt in irts:
-                all_rts.append((irt, factor, exp))
-
-        if ok and intervals_disjoint([rt for (rt, fac, mult) in all_rts]):
-            all_rts = sort_complex_numbers_for_display(all_rts)
-            if retval == 'interval':
-                return [(rt, mult) for (rt, fac, mult) in all_rts]
-            elif retval == 'algebraic':
-                return [(QQbar.polynomial_root(fac, rt), mult) for (rt, fac, mult) in all_rts]
-            elif retval == 'algebraic_real':
-                rts = []
-                for (rt, fac, mult) in all_rts:
-                    qqbar_rt = QQbar.polynomial_root(fac, rt)
-                    if qqbar_rt.imag().is_zero():
-                        rts.append((AA(qqbar_rt), mult))
-                return rts
-
-        prec = prec * 2
diff --git a/sandbox/poly/polroots.c.parigp b/sandbox/poly/polroots.c.parigp
deleted file mode 100644
index f1516ee..0000000
--- a/sandbox/poly/polroots.c.parigp
+++ /dev/null
@@ -1,104 +0,0 @@
-/****************************************************************************
- *
- * polroots.c                                               Laurent Bartholdi
- *
- *   @(#)$Id: polroots.c,v 1.2 2007/05/01 15:57:56 gap Exp $
- *
- * Copyright (C) 2007, Laurent Bartholdi
- *
- ****************************************************************************
- *
- * use pari-gp to compute the roots of a univariate polynomial
- * 
- ****************************************************************************/
-
-#include "src/compiled.h"
-
-#define VAL_FLOAT(obj) (*(double *)ADDR_OBJ(obj))
-#define SIZE_FLOAT   sizeof(double)
-static inline Obj NEW_FLOAT( double val )
-{
-  Obj f = NewBag(T_FLOAT,SIZE_FLOAT);
-  *(double *)ADDR_OBJ(f) = val;
-  return f;
-}
-
-#define binomial pari_binomial
-#include <pari/pari.h>
-
-long pari_prec = 4;
-#define PARISTACK 100000
-
-/* handler for function 2 */
-static Obj  COMPLEX_ROOTS (Obj self, Obj mode, Obj coeffs)
-{
-  Obj result, t;
-  int i, degree;
-  GEN poly, x;
-  pari_sp av;
-
-  degree = LEN_PLIST(coeffs)-1;
-
-  av = avma;
-  poly = cgetg(degree+3, t_POL);
-  poly[1] = evalvarn(0);
-  for (i = 0; i <= degree; i++) {
-    x = gel(poly+2,i) = cgetc(pari_prec);
-    gel(x,1) = dbltor(VAL_FLOAT(ELM_PLIST(ELM_PLIST(coeffs,i+1),1)));
-    gel(x,2) = dbltor(VAL_FLOAT(ELM_PLIST(ELM_PLIST(coeffs,i+1),2)));
-  }
-
-  x = roots0(normalizepol(poly), INT_INTOBJ(mode), pari_prec);
-
-  result = NEW_PLIST(T_PLIST, degree);
-  SET_LEN_PLIST(result, degree);
-  for (i = 1; i <= degree; i++) {
-    t = NEW_PLIST(T_PLIST, 2); SET_LEN_PLIST(t,2);
-    SET_ELM_PLIST(t,1, NEW_FLOAT(gtodouble(gel(gel(x,i),1))));
-    SET_ELM_PLIST(t,2, NEW_FLOAT(gtodouble(gel(gel(x,i),2))));
-    SET_ELM_PLIST(result,i, t);
-  }
-  avma = av;
-
-  return result;
-}
-
-static StructGVarFunc GVarFuncs [] = {
-  { "COMPLEX_ROOTS", 2, "mode, coeffs", COMPLEX_ROOTS, "polroots.c:COMPLEX_ROOTS" },
-  { 0 }
-};
-
-static Int InitKernel ( StructInitInfo * module )
-{
-  InitHdlrFuncsFromTable( GVarFuncs );
-  return 0;
-}
-
-/* 'InitLibrary' sets up gvars, rnams, functions */
-static Int InitLibrary ( StructInitInfo * module )
-{
-  InitGVarFuncsFromTable( GVarFuncs );
-  pari_init_opts(PARISTACK,0,INIT_DFTm);
-  return 0;
-}
-
-static StructInitInfo module = {
- /* type        = */ MODULE_DYNAMIC,
- /* name        = */ "polroots.c",
- /* revision_c  = */ 0,
- /* revision_h  = */ 0,
- /* version     = */ 0,
- /* crc         = */ 0,
- /* initKernel  = */ InitKernel,
- /* initLibrary = */ InitLibrary,
- /* checkInit   = */ 0,
- /* preSave     = */ 0,
- /* postSave    = */ 0,
- /* postRestore = */ 0
-};
-
-StructInitInfo * Init__Dynamic ( void )
-{
- return &module;
-}
-/* polroots.c . . . . . . . . . . . . . . . . . . . . . . . . . . ends here */
diff --git a/sandbox/poly/rpoly.c.buggy b/sandbox/poly/rpoly.c.buggy
deleted file mode 100644
index be795be..0000000
--- a/sandbox/poly/rpoly.c.buggy
+++ /dev/null
@@ -1,758 +0,0 @@
-/*      rpoly.cpp -- Jenkins-Traub real polynomial root finder.
- *
- *      (C) 2000, C. Bond.  All rights reserved.
- *
- *      Translation of TOMS493 from FORTRAN to C. This
- *      implementation of Jenkins-Traub partially adapts
- *      the original code to a C environment by restruction
- *      many of the 'goto' controls to better fit a block
- *      structured form. It also eliminates the global memory
- *      allocation in favor of local, dynamic memory management.
- *
- *      The calling conventions are slightly modified to return
- *      the number of roots found as the function value.
- *
- *      INPUT:
- *      op - double precision vector of coefficients in order of
- *              decreasing powers.
- *      degree - integer degree of polynomial
- *
- *      OUTPUT:
- *      zeror,zeroi - output double precision vectors of the
- *              real and imaginary parts of the zeros.
- *
- *      RETURN:
- *      returnval:   -1 if leading coefficient is zero, otherwise
- *                  number of roots found. 
- *
- * Modified by LB, 20110314, to use standard C allocation and not C++.
- */
-
-#include <time.h>
-#include <math.h>
-#include <float.h>
-#include "poly.h"
-
-void quad(double a,double b1,double c,double *sr,double *si,
-        double *lr,double *li);
-void fxshfr(int l2, int *nz);
-void quadit(double *uu,double *vv,int *nz);
-void realit(double sss, int *nz, int *iflag);
-void calcsc(int *type);
-void nextk(int *type);
-void newest(int type,double *uu,double *vv);
-void quadsd(int n,double *u,double *v,double *p,double *q,
-        double *a,double *b);
-double *p,*qp,*k,*qk,*svk;
-double sr,si,u,v,a,b,c,d,a1,a2;
-double a3,a6,a7,e,f,g,h,szr,szi,lzr,lzi;
-double eta,are,mre;
-int n,nn,nmi,zerok;
-static int itercnt;
-
-int rpoly(double *op, int degree, double *zeror, double *zeroi, int info[] ) 
-{
-    double t,aa,bb,cc,factor,rot;
-    double *pt;
-    double lo,max,min,xx,yy,cosr,sinr,xxx,x,sc,bnd;
-    double xm,ff,df,dx,infin,smalno,base;
-    int cnt,nz,i,j,jj,l,nm1,zerok;
-    long sec;
-
-    sec = clock();
-
-/*  The following statements set machine constants. */
-    base = FLT_RADIX;
-    eta = DBL_EPSILON;
-    infin = DBL_MAX;
-    smalno = DBL_MIN;
-
-    are = eta;
-    mre = eta;
-    lo = smalno/eta;
-/*  Initialization of constants for shift rotation. */        
-    xx = sqrt(0.5);
-    yy = -xx;
-    rot = 94.0;
-    rot *= 0.017453293;
-    cosr = cos(rot);
-    sinr = sin(rot);
-    n = degree;
-/*  Algorithm fails of the leading coefficient is zero. */
-    if (op[0] == 0.0) return -1;
-/*  Remove the zeros at the origin, if any. */
-    while (op[n] == 0.0) {
-        j = degree - n;
-        zeror[j] = 0.0;
-        zeroi[j] = 0.0;
-        n--;
-    }
-    if (n < 1) return degree;
-/*
- *  Allocate memory here
- */
-    double temp[(degree+1)*7];
-    pt = temp + (degree+1);
-    p = temp + 2*(degree+1);
-    qp = temp + 3*(degree+1);
-    k = temp + 4*(degree+1);
-    qk = temp + 5*(degree+1);
-    svk = temp + 6*(degree+1);
-/*  Make a copy of the coefficients. */
-    for (i=0;i<=n;i++)
-        p[i] = op[i];
-/*  Start the algorithm for one zero. */
-_40:        
-    itercnt = 0;
-    if (n == 1) {
-        zeror[degree-1] = -p[1]/p[0];
-        zeroi[degree-1] = 0.0;
-        n -= 1;
-        if( info != NULL )
-           info[ degree ] = 0;
-
-        goto _99;
-    }
-/*  Calculate the final zero or pair of zeros. */
-    if (n == 2) {
-        quad(p[0],p[1],p[2],&zeror[degree-2],&zeroi[degree-2],
-            &zeror[degree-1],&zeroi[degree-1]);
-        n -= 2;
-        if( info != NULL )
-           info[ degree ] = info[ degree - 1] = 0;
-        goto _99;
-    }
-/*  Find largest and smallest moduli of coefficients. */
-    max = 0.0;
-    min = infin;
-    for (i=0;i<=n;i++) {
-        x = fabs(p[i]);
-        if (x > max) max = x;
-        if (x != 0.0 && x < min) min = x;
-    }
-/*  Scale if there are large or very small coefficients.
- *  Computes a scale factor to multiply the coefficients of the
- *  polynomial. The scaling si done to avoid overflow and to
- *  avoid undetected underflow interfering with the convergence
- *  criterion. The factor is a power of the base.
- */
-    sc = lo/min;
-    if (sc > 1.0 && infin/sc < max) goto _110;
-    if (sc <= 1.0) {
-        if (max < 10.0) goto _110;
-        if (sc == 0.0)
-            sc = smalno;
-    }
-    l = (int)(log(sc)/log(base) + 0.5);
-    factor = pow(base*1.0,l);
-    if (factor != 1.0) {
-        for (i=0;i<=n;i++) 
-            p[i] = factor*p[i];     /* Scale polynomial. */
-    }
-_110:
-/*  Compute lower bound on moduli of roots. */
-    for (i=0;i<=n;i++) {
-        pt[i] = (fabs(p[i]));
-    }
-    pt[n] = - pt[n];
-/*  Compute upper estimate of bound. */
-    x = exp((log(-pt[n])-log(pt[0])) / (double)n);
-/*  If Newton step at the origin is better, use it. */        
-    if (pt[n-1] != 0.0) {
-        xm = -pt[n]/pt[n-1];
-        if (xm < x)  x = xm;
-    }
-/*  Chop the interval (0,x) until ff <= 0 */
-    while (1) {
-        xm = x*0.1;
-        ff = pt[0];
-        for (i=1;i<=n;i++) 
-            ff = ff*xm + pt[i];
-        if (ff <= 0.0) break;
-        x = xm;
-    }
-    dx = x;
-/*  Do Newton interation until x converges to two 
- *  decimal places. 
- */
-    while (fabs(dx/x) > 0.005) {
-        ff = pt[0];
-        df = ff;
-        for (i=1;i<n;i++) { 
-            ff = ff*x + pt[i];
-            df = df*x + ff;
-        }
-        ff = ff*x + pt[n];
-        dx = ff/df;
-        x -= dx;
-        itercnt++;
-    }
-    bnd = x;
-/*  Compute the derivative as the initial k polynomial
- *  and do 5 steps with no shift.
- */
-    nm1 = n - 1;
-    for (i=1;i<n;i++)
-        k[i] = (double)(n-i)*p[i]/(double)n;
-    k[0] = p[0];
-    aa = p[n];
-    bb = p[n-1];
-    zerok = (k[n-1] == 0);
-    for(jj=0;jj<5;jj++) {
-        itercnt++;
-        cc = k[n-1];
-        if (!zerok) {
-/*  Use a scaled form of recurrence if value of k at 0 is nonzero. */             
-            t = -aa/cc;
-            for (i=0;i<nm1;i++) {
-                j = n-i-1;
-                k[j] = t*k[j-1]+p[j];
-            }
-            k[0] = p[0];
-            zerok = (fabs(k[n-1]) <= fabs(bb)*eta*10.0);
-        }
-        else {
-/*  Use unscaled form of recurrence. */
-            for (i=0;i<nm1;i++) {
-                j = n-i-1;
-                k[j] = k[j-1];
-            }
-            k[0] = 0.0;
-            zerok = (k[n-1] == 0.0);
-        }
-    }
-/*  Save k for restarts with new shifts. */
-    for (i=0;i<n;i++) 
-        temp[i] = k[i];
-/*  Loop to select the quadratic corresponding to each new shift. */
-    for (cnt = 0;cnt < 20;cnt++) {
-/*  Quadratic corresponds to a double shift to a            
- *  non-real point and its complex conjugate. The point
- *  has modulus bnd and amplitude rotated by 94 degrees
- *  from the previous shift.
- */ 
-        xxx = cosr*xx - sinr*yy;
-        yy = sinr*xx + cosr*yy;
-        xx = xxx;
-        sr = bnd*xx;
-        si = bnd*yy;
-        u = -2.0 * sr;
-        v = bnd;
-        fxshfr(20*(cnt+1),&nz);
-        if (nz != 0) {
-/*  The second stage jumps directly to one of the third
- *  stage iterations and returns here if successful.
- *  Deflate the polynomial, store the zero or zeros and
- *  return to the main algorithm.
- */
-            j = degree - n;
-            zeror[j] = szr;
-            zeroi[j] = szi;
-            if( info != NULL )
-               info[ j + 1 ] = itercnt;
-            n -= nz;
-            for (i=0;i<=n;i++)
-                p[i] = qp[i];
-            if (nz != 1) {
-                zeror[j+1] = lzr;
-                zeroi[j+1] = lzi;
-                if( info != NULL )
-                  info[ j + 2 ] = 0;
-            }
-            goto _40;
-        }
-/*  If the iteration is unsuccessful another quadratic
- *  is chosen after restoring k.
- */
-        for (i=0;i<n;i++) {
-            k[i] = temp[i];
-        }
-    } 
-/*  Return with failure if no convergence with 20 shifts. */
-_99:
-    if (info != NULL) {
-      info[ 0 ] = clock() - sec;
-      info[ 0 ] *= 1000;
-      info[ 0 ] /= CLOCKS_PER_SEC;
-    }
-    return degree - n;
-}
-/*  Computes up to L2 fixed shift k-polynomials,
- *  testing for convergence in the linear or quadratic
- *  case. Initiates one of the variable shift
- *  iterations and returns with the number of zeros
- *  found.
- */
-void fxshfr(int l2,int *nz)
-{
-    double svu,svv,ui,vi,s;
-    double betas,betav,oss,ovv,ss,vv,ts,tv;
-    double ots,otv,tvv,tss;
-	int type, i,j,iflag,vpass,spass,vtry,stry;
-
-	*nz = 0;
-	betav = 0.25;
-	betas = 0.25;
-	oss = sr;
-	ovv = v;
-/*  Evaluate polynomial by synthetic division. */
-    quadsd(n,&u,&v,p,qp,&a,&b);
-	calcsc(&type);
-	for (j=0;j<l2;j++) {
-/*  Calculate next k polynomial and estimate v. */
-		nextk(&type);
-		calcsc(&type);
-		newest(type,&ui,&vi);
-		vv = vi;
-/*  Estimate s. */
-        ss = 0.0;
-        if (k[n-1] != 0.0) ss = -p[n]/k[n-1];
-		tv = 1.0;
-		ts = 1.0;
-		if (j == 0 || type == 3) goto _70;
-/*  Compute relative measures of convergence of s and v sequences. */
-        if (vv != 0.0) tv = fabs((vv-ovv)/vv);
-        if (ss != 0.0) ts = fabs((ss-oss)/ss);
-/*  If decreasing, multiply two most recent convergence measures. */
-		tvv = 1.0;
-		if (tv < otv) tvv = tv*otv;
-		tss = 1.0;
-		if (ts < ots) tss = ts*ots;
-/*  Compare with convergence criteria. */
-		vpass = (tvv < betav);
-		spass = (tss < betas);
-		if (!(spass || vpass)) goto _70;
-/*  At least one sequence has passed the convergence test.
- *  Store variables before iterating.
- */
-		svu = u;
-		svv = v;
-		for (i=0;i<n;i++) {
-			svk[i] = k[i];
-		}
-		s = ss;
-/*  Choose iteration according to the fastest converging
- *  sequence.
- */
-		vtry = 0;
-		stry = 0;
-		if (spass && (!vpass) || tss < tvv) goto _40;
-_20:        
-		quadit(&ui,&vi,nz);
-        if (*nz > 0) return;
-/*  Quadratic iteration has failed. Flag that it has
- *  been tried and decrease the convergence criterion.
- */
-		vtry = 1;
-		betav *= 0.25;
-/*  Try linear iteration if it has not been tried and
- *  the S sequence is converging.
- */
-		if (stry || !spass) goto _50;
-		for (i=0;i<n;i++) {
-			k[i] = svk[i];
-		}
-_40:
-		realit(s,nz,&iflag);
-		if (*nz > 0) return;
-/*  Linear iteration has failed. Flag that it has been
- *  tried and decrease the convergence criterion.
- */
-		stry = 1;
-		betas *=0.25;
-		if (iflag == 0) goto _50;
-/*  If linear iteration signals an almost double real
- *  zero attempt quadratic iteration.
- */
-		ui = -(s+s);
-		vi = s*s;
-		goto _20;
-/*  Restore variables. */
-_50:
-		u = svu;
-		v = svv;
-		for (i=0;i<n;i++) {
-			k[i] = svk[i];
-		}
-/*  Try quadratic iteration if it has not been tried
- *  and the V sequence is convergin.
- */
-		if (vpass && !vtry) goto _20;
-/*  Recompute QP and scalar values to continue the
- *  second stage.
- */
-        quadsd(n,&u,&v,p,qp,&a,&b);
-		calcsc(&type);
-_70:
-		ovv = vv;
-		oss = ss;
-		otv = tv;
-		ots = ts;
-	}
-}
-/*  Variable-shift k-polynomial iteration for a
- *  quadratic factor converges only if the zeros are
- *  equimodular or nearly so.
- *  uu, vv - coefficients of starting quadratic.
- *  nz - number of zeros found.
- */
-void quadit(double *uu,double *vv,int *nz)
-{
-    double ui,vi;
-    double mp,omp,ee,relstp,t,zm;
-	int type,i,j,tried;
-
-	*nz = 0;
-	tried = 0;
-	u = *uu;
-	v = *vv;
-	j = 0;
-/*  Main loop. */
-_10:    
-   itercnt++;
-	quad(1.0,u,v,&szr,&szi,&lzr,&lzi);
-/*  Return if roots of the quadratic are real and not
- *  close to multiple or nearly equal and of opposite
- *  sign.
- */
-    if (fabs(fabs(szr)-fabs(lzr)) > 0.01 * fabs(lzr)) return;
-/*  Evaluate polynomial by quadratic synthetic division. */
-    quadsd(n,&u,&v,p,qp,&a,&b);
-    mp = fabs(a-szr*b) + fabs(szi*b);
-/*  Compute a rigorous bound on the rounding error in
- *  evaluating p.
- */
-    zm = sqrt(fabs(v));
-    ee = 2.0*fabs(qp[0]);
-	t = -szr*b;
-	for (i=1;i<n;i++) {
-        ee = ee*zm + fabs(qp[i]);
-	}
-    ee = ee*zm + fabs(a+t);
-    ee *= (5.0 *mre + 4.0*are);
-       ee = ee -(5.0*mre+2.0*are)*(fabs(a)+t) +fabs(b)*zm;    // HVE (fabs(a+t)) -> (fabs(a)+t) && fabs(b*zm) ->fabs(b)*zm
-       ee = ee+2.0*are*fabs(t);
-/*  Iteration has converged sufficiently if the
- *  polynomial value is less than 20 times this bound.
- */
-    if (mp <= 20.0*ee) {
-        *nz = 2;
-        return;
-    }
-
-	j++;
-/*  Stop iteration after 20 steps. */
-	if (j > 20) return;
-	if (j < 2) goto _50;
-    if (relstp > 0.01 || mp < omp || tried) goto _50;
-/*  A cluster appears to be stalling the convergence.
- *  Five fixed shift steps are taken with a u,v close
- *  to the cluster.
- */
-	if (relstp < eta) relstp = eta;
-	relstp = sqrt(relstp);
-	u = u - u*relstp;
-	v = v + v*relstp;
-    quadsd(n,&u,&v,p,qp,&a,&b);
-	for (i=0;i<5;i++) {
-		calcsc(&type);
-		nextk(&type);
-	}
-	tried = 1;
-	j = 0;
-_50:
-	omp = mp;
-/*  Calculate next k polynomial and new u and v. */
-	calcsc(&type);
-	nextk(&type);
-	calcsc(&type);
-	newest(type,&ui,&vi);
-/*  If vi is zero the iteration is not converging. */
-    if (vi == 0.0) return;
-    relstp = fabs((vi-v)/vi);
-	u = ui;
-	v = vi;
-	goto _10;
-}
-/*  Variable-shift H polynomial iteration for a real zero.
- *  sss - starting iterate
- *  nz  - number of zeros found
- *  iflag - flag to indicate a pair of zeros near real axis.
- */
-void realit(double sss, int *nz, int *iflag)
-{
-    double pv,kv,t,s;
-    double ms,mp,omp,ee;
-    int i,j;
-
-	*nz = 0;
-	s = sss;
-	*iflag = 0;
-	j = 0;
-/*  Main loop */
-    while (1) {
-        itercnt++;
-        pv = p[0];
-/*  Evaluate p at s. */
-        qp[0] = pv;
-        for (i=1;i<=n;i++) {
-            pv = pv*s + p[i];
-            qp[i] = pv;
-        }
-        mp = fabs(pv);
-/*  Compute a rigorous bound on the error in evaluating p. */
-        ms = fabs(s);
-        ee = (mre/(are+mre))*fabs(qp[0]);
-        for (i=1;i<=n;i++) {
-            ee = ee*ms + fabs(qp[i]);
-        }
-/*  Iteration has converged sufficiently if the polynomial
- *  value is less than 20 times this bound.
- */
-        if (mp <= 20.0*((are+mre)*ee-mre*mp)) {
-            *nz = 1;
-            szr = s;
-            szi = 0.0;   return ;                     // HVE return added
-        }
-        j++;
-/*  Stop iteration after 10 steps. */
-        if (j > 10) return;
-        if (j < 2) goto _50;
-        if (fabs(t) > 0.001*fabs(s-t) || mp < omp) goto _50;
-/*  A cluster of zeros near the real axis has been
- *  encountered. Return with iflag set to initiate a
- *  quadratic iteration.
- */
-        *iflag = 1;  sss =s;                          // HVE sss=s added
-        return;
-/*  Return if the polynomial value has increased significantly. */
-_50:
-        omp = mp;
-/*  Compute t, the next polynomial, and the new iterate. */
-        kv = k[0];
-        qk[0] = kv;
-        for (i=1;i<n;i++) {
-            kv = kv*s + k[i];
-            qk[i] = kv;
-        }
-        if (fabs(kv) <= fabs(k[n-1])*10.0*eta) {         // HVE n -> n-1
-/*  Use unscaled form. */
-            k[0] = 0.0;
-            for (i=1;i<n;i++) {
-                k[i] = qk[i-1];
-            }
-        }
-        else {
-/*  Use the scaled form of the recurrence if the value
- *  of k at s is nonzero.
- */
-            t = -pv/kv;
-            k[0] = qp[0];
-            for (i=1;i<n;i++) {
-                k[i] = t*qk[i-1] + qp[i];
-            }
-        }
-        kv = k[0];
-        for (i=1;i<n;i++) {
-            kv = kv*s + k[i];
-        }
-        t = 0.0;
-        if (fabs(kv) > fabs(k[n-1]*10.0*eta)) t = -pv/kv;
-        s += t;
-    }
-}
-
-/*  This routine calculates scalar quantities used to
- *  compute the next k polynomial and new estimates of
- *  the quadratic coefficients.
- *  type - integer variable set here indicating how the
- *  calculations are normalized to avoid overflow.
- */
-void calcsc(int *type)
-{
-/*  Synthetic division of k by the quadratic 1,u,v */    
-    quadsd(n-1,&u,&v,k,qk,&c,&d);
-    if (fabs(c) > fabs(k[n-1]*100.0*eta)) goto _10;
-    if (fabs(d) > fabs(k[n-2]*100.0*eta)) goto _10;
-	*type = 3;
-/*  Type=3 indicates the quadratic is almost a factor of k. */
-	return;
-_10:
-    if (fabs(d) < fabs(c)) {
-        *type = 1;
-/*  Type=1 indicates that all formulas are divided by c. */   
-        e = a/c;
-        f = d/c;
-        g = u*e;
-        h = v*b;
-        a3 = a*e + (h/c+g)*b;
-        a1 = b - a*(d/c);
-        a7 = a + g*d + h*f;
-        return;
-    }
-    *type = 2;
-/*  Type=2 indicates that all formulas are divided by d. */
-	e = a/d;
-	f = c/d;
-	g = u*b;
-	h = v*b;
-	a3 = (a+g)*e + h*(b/d);
-	a1 = b*f-a;
-	a7 = (f+u)*a + h;
-}
-/*  Computes the next k polynomials using scalars 
- *  computed in calcsc.
- */
-void nextk(int *type)
-{
-    double temp;
-	int i;
-
-    if (*type == 3) {
-/*  Use unscaled form of the recurrence if type is 3. */
-        k[0] = 0.0;
-        k[1] = 0.0;
-        for (i=2;i<n;i++) {
-            k[i] = qk[i-2];
-        }
-        return;
-    }
-	temp = a;
-	if (*type == 1) temp = b;
-    if (fabs(a1) <= fabs(temp)*eta*10.0) {
-/*  If a1 is nearly zero then use a special form of the
- *  recurrence.
- */
-        k[0] = 0.0;
-        k[1] = -a7*qp[0];
-        for(i=2;i<n;i++) {
-            k[i] = a3*qk[i-2] - a7*qp[i-1];
-        }   return;           // HVE return added
-    }
-/*  Use scaled form of the recurrence. */
-	a7 /= a1;
-	a3 /= a1;
-	k[0] = qp[0];
-	k[1] = qp[1] - a7*qp[0];
-	for (i=2;i<n;i++) {
-		k[i] = a3*qk[i-2] - a7*qp[i-1] + qp[i];
-	}
-}
-/*  Compute new estimates of the quadratic coefficients
- *  using the scalars computed in calcsc.
- */
-void newest(int type,double *uu,double *vv)
-{
-    double a4,a5,b1,b2,c1,c2,c3,c4,temp;
-
-/* Use formulas appropriate to setting of type. */
-    if (type == 3) {
-/*  If type=3 the quadratic is zeroed. */
-        *uu = 0.0;
-        *vv = 0.0;
-        return;
-    }
-    if (type == 2) {
-        a4 = (a+g)*f + h;
-        a5 = (f+u)*c + v*d;
-    }
-    else {
-        a4 = a + u*b +h*f;
-        a5 = c + (u+v*f)*d;
-    }
-/*  Evaluate new quadratic coefficients. */
-    b1 = -k[n-1]/p[n];
-    b2 = -(k[n-2]+b1*p[n-1])/p[n];
-	c1 = v*b2*a1;
-	c2 = b1*a7;
-	c3 = b1*b1*a3;
-	c4 = c1 - c2 - c3;
-	temp = a5 + b1*a4 - c4;
-    if (temp == 0.0) {
-        *uu = 0.0;
-        *vv = 0.0;
-        return;
-    }
-	*uu = u - (u*(c3+c2)+v*(b1*a1+b2*a7))/temp;
-	*vv = v*(1.0+c4/temp);
-	return;
-}
-
-/*  Divides p by the quadratic 1,u,v placing the quotient
- *  in q and the remainder in a,b.
- */
-void quadsd(int nn,double *u,double *v,double *p,double *q,
-    double *a,double *b)
-{
-    double c;
-	int i;
-	*b = p[0];
-	q[0] = *b;
-    *a = p[1] - (*b)*(*u);
-	q[1] = *a;
-    for (i=2;i<=nn;i++) {
-        c = p[i] - (*a)*(*u) - (*b)*(*v);
-		q[i] = c;
-		*b = *a;
-		*a = c;
-	}
-}
-/*  Calculate the zeros of the quadratic a*z^2 + b1*z + c.
- *  The quadratic formula, modified to avoid overflow, is used 
- *  to find the larger zero if the zeros are real and both
- *  are complex. The smaller real zero is found directly from 
- *  the product of the zeros c/a.
- */
-void quad(double a,double b1,double c,double *sr,double *si,
-        double *lr,double *li)
-{
-        double b,d,e;
-
-        if (a == 0.0) {         /* less than two roots */
-            if (b1 != 0.0)     
-				*sr = -c/b1;
-			else 
-                *sr = 0.0;
-            *lr = 0.0;
-            *si = 0.0;
-            *li = 0.0;
-			return;
-		}
-        if (c == 0.0) {         /* one real root, one zero root */
-            *sr = 0.0;
-			*lr = -b1/a;
-            *si = 0.0;
-            *li = 0.0;
-			return;
-		}
-/* Compute discriminant avoiding overflow. */
-		b = b1/2.0;
-        if (fabs(b) < fabs(c)) { 
-            if (c < 0.0) 
-				e = -a;
-			else
-				e = a;
-            e = b*(b/fabs(c)) - e;
-            d = sqrt(fabs(e))*sqrt(fabs(c));
-		}
-		else {
-			e = 1.0 - (a/b)*(c/b);
-            d = sqrt(fabs(e))*fabs(b);
-		}
-        if (e < 0.0) {      /* complex conjugate zeros */
-			*sr = -b/a;
-			*lr = *sr;
-            *si = fabs(d/a);
-			*li = -(*si);
-		}
-		else {
-            if (b >= 0.0)   /* real zeros. */
-				d = -d;
-				*lr = (-b+d)/a;
-                *sr = 0.0;
-                if (*lr != 0.0) 
-					*sr = (c/ *lr)/a;
-                *si = 0.0;
-                *li = 0.0;
-		}
-}
diff --git a/sandbox/poly/xcomplex_double.h b/sandbox/poly/xcomplex_double.h
deleted file mode 100644
index bcc0258..0000000
--- a/sandbox/poly/xcomplex_double.h
+++ /dev/null
@@ -1,70 +0,0 @@
-typedef double xreal;
-
-class xcomplex { 
- public:
-  std::complex<double> z;
-
-  // constants
-  static const long int MAX_EXP = DBL_MAX_EXP;
-  static const long int MIN_EXP = DBL_MIN_EXP;
-  static const double INFIN = DBL_MAX;
-  static const double ZERO = 0.0;
-
-  // constructor
-  xcomplex () { };
-//xcomplex ( const int a ){ z = std::complex<double>(a); };
-  xcomplex ( const double a ) { z = std::complex<double>( a ); };
-  xcomplex ( const double a, const double b ) { z = std::complex<double>( a, b ); };
-  xcomplex ( const std::complex<double> newz ){ z = newz; };
-
-  // operations
-//xcomplex operator + ( ){ return( xcomplex( z ) ); };
-  xcomplex operator - ( ){ return( xcomplex( -z ) ); };
-  xcomplex operator + ( const xcomplex newz ) const { return( xcomplex( z + newz.z ) ); };
-  xcomplex operator - ( const xcomplex newz ) const { return( xcomplex( z - newz.z ) ); };
-  xcomplex operator * ( const xcomplex newz ) const { return( xcomplex( z * newz.z ) ); };
-  xcomplex operator / ( const xcomplex newz ) const { return( xcomplex( z / newz.z ) ); };
-
-  void operator += ( const xcomplex newz ){ z += newz.z; };
-  void operator -= ( const xcomplex newz ){ z -= newz.z; };
-  void operator *= ( const xcomplex newz ){ z *= newz.z; };
-//void operator /= ( const xcomplex newz ){ z /= newz.z; };
-
-//void operator = ( const xcomplex newz ) { z = newz.z; };
-//void operator = ( const std::complex<double> newz ) { z = newz; };
-//void operator = ( const double newz ) { z = (std::complex<double>)(newz); };
-  
-  unsigned int operator == ( const xcomplex newz ) const { return( z == newz.z ); };
-  unsigned int operator != ( const xcomplex newz ) const { return( z != newz.z ); };
-
-  friend double real ( const xcomplex );
-  friend double imag ( const xcomplex );
-  friend double abs ( const xcomplex );
-  friend long int ilogbl( const xcomplex );
-  friend std::ostream& operator << (std::ostream &s, xcomplex &newz);
-  void xscalbln(long int e){ 
-    z = std::complex<double>(scalbln( real( z ), e ), scalbln( imag( z ), e));
-  }
-}; 
-
-xcomplex operator / ( const double a, const xcomplex newz ){ return( xcomplex( a / newz.z ) ); };
-xcomplex operator * ( const double a, const xcomplex newz ){ return( xcomplex( a * newz.z ) ); };
-
-std::ostream& operator << ( std::ostream &s, xcomplex &newz ){
-  s << "(" << real( newz ) << "," << imag( newz ) << ")";
-  return( s );
-}
-
-double real ( const xcomplex newz ){ return( real( newz.z ) ); };
-
-double imag ( const xcomplex newz ){ return( imag(newz.z) ); };
-
-double abs ( const xcomplex newz ){ return( abs( newz.z ) ); };
-
-double norm ( const xcomplex newz ){ return( norm( newz.z ) ); };
-
-long int ilogbl( const xcomplex newz ){ return( ilogbl( abs( newz ) ) ); };
-
-double Precision( const xcomplex z ){ return( DBL_EPSILON ); };
-
-long int PrecisionInt( const xcomplex z ){ return( ilogbl( Precision( z ) ) ); };
diff --git a/sandbox/poly/xcomplex_float.h b/sandbox/poly/xcomplex_float.h
deleted file mode 100644
index 3432c41..0000000
--- a/sandbox/poly/xcomplex_float.h
+++ /dev/null
@@ -1,69 +0,0 @@
-class xcomplex { 
- public:
-  std::complex<float> z;
-
-  // constants
-  static const long int MAX_EXP = FLT_MAX_EXP;
-  static const long int MIN_EXP = FLT_MIN_EXP;
-  static const float INFIN = FLT_MAX;
-
-  // constructor
-  xcomplex () { };
-  xcomplex ( const int a ){ z = std::complex<float>(a); };
-  xcomplex ( const float a ) { z = std::complex<float>( a ); };
-  xcomplex ( const double a ) { z = std::complex<float>( a ); };                      // needed for constants 1.0
-  xcomplex ( const float a, const float b ) { z = std::complex<float>( a, b ); };
-  xcomplex ( const std::complex<float> newz ){ z = newz; };
-
-  // operations
-  xcomplex operator + ( ){ return( xcomplex( z ) ); };
-  xcomplex operator - ( ){ return( xcomplex( -z ) ); };
-  xcomplex operator + ( const xcomplex newz ){ return( xcomplex( z + newz.z ) ); };
-  xcomplex operator - ( const xcomplex newz ){ return( xcomplex( z - newz.z ) ); };
-  xcomplex operator * ( const xcomplex newz ){ return( xcomplex( z * newz.z ) ); };
-  xcomplex operator / ( const xcomplex newz ){ return( xcomplex( z / newz.z ) ); };
-
-  void operator += ( const xcomplex newz ){ z += newz.z; };
-  void operator -= ( const xcomplex newz ){ z -= newz.z; };
-  void operator *= ( const xcomplex newz ){ z *= newz.z; };
-  void operator /= ( const xcomplex newz ){ z /= newz.z; };
-
-  void operator = ( const xcomplex newz ) { z = newz.z; };
-  void operator = ( const std::complex<float> newz ) { z = newz; };
-  void operator = ( const float newz ) { z = (std::complex<float>)(newz); };
-  
-  unsigned int operator == ( const xcomplex newz ){ return( z == newz.z ); };
-  unsigned int operator != ( const xcomplex newz ){ return( z != newz.z ); };
-
-  friend float real ( const xcomplex );
-  friend float imag ( const xcomplex );
-  friend float abs ( const xcomplex );
-  friend long int ilogbl( const xcomplex );
-  friend xcomplex scalbln( const xcomplex, long int );
-  friend std::ostream& operator << (std::ostream &s, xcomplex &newz);
-};
-
-xcomplex operator / ( const float a, const xcomplex newz ){ return( xcomplex( a / newz.z ) ); };
-xcomplex operator * ( const float a, const xcomplex newz ){ return( xcomplex( a * newz.z ) ); };
-
-std::ostream& operator << ( std::ostream &s, xcomplex &newz ){
-  s << "(" << real( newz ) << "," << imag( newz ) << ")";
-  return( s );
-}
-
-float real ( const xcomplex newz ){ return( real( newz.z ) ); };
-
-float imag ( const xcomplex newz ){ return( imag(newz.z) ); };
-
-float abs ( const xcomplex newz ){ return( abs( newz.z ) ); };
-
-long int ilogbl( const xcomplex newz ){ return( ilogbl( abs( newz ) ) ); };
-
-xcomplex scalbln( const xcomplex z, long int e ){ 
-  xcomplex b ( scalbln( real( z ), e ), scalbln( imag( z ), e ) );
-  return( b );
-}; 
-
-long int PrecisionInt( const xcomplex z ){ return( ilogbl( FLT_EPSILON ) ); };
-
-float Precision( const xcomplex z ){ return( FLT_EPSILON ); };
diff --git a/sandbox/poly/xcomplex_float128.h b/sandbox/poly/xcomplex_float128.h
deleted file mode 100644
index b0e1d92..0000000
--- a/sandbox/poly/xcomplex_float128.h
+++ /dev/null
@@ -1,69 +0,0 @@
-class xcomplex { 
- public:
-  std::complex<__float128> z;
-
-  // constants
-  static const long int MAX_EXP = LDBL_MAX_EXP;
-  static const long int MIN_EXP = LDBL_MIN_EXP;
-  static const long double INFIN = LDBL_MAX;
-
-  // constructor
-  xcomplex () { };
-  xcomplex ( const int a ){ z = a; };
-  xcomplex ( const long double a ) { z = a; };
-  xcomplex ( const double a ) { z = a; };                      // needed for constants 1.0
-  xcomplex ( const __float128 a, const __float128 b ) { z = std::complex<__float128>(a,b); };
-  xcomplex ( std::complex<__float128> newz ){ z = newz; }
-
-  // operations
-  xcomplex operator + ( ){ return( xcomplex( z ) ); };
-  xcomplex operator - ( ){ return( xcomplex( -z ) ); };
-  xcomplex operator + ( const xcomplex newz ){ return( xcomplex( z + newz.z ) ); };
-  xcomplex operator - ( const xcomplex newz ){ return( xcomplex( z - newz.z ) ); };
-  xcomplex operator * ( const xcomplex newz ){ return( xcomplex( z * newz.z ) ); };
-  xcomplex operator / ( const xcomplex newz ){ return( xcomplex( z / newz.z ) ); };
-
-  void operator += ( const xcomplex newz ){ z += newz.z; };
-  void operator -= ( const xcomplex newz ){ z -= newz.z; };
-  void operator *= ( const xcomplex newz ){ z *= newz.z; };
-  void operator /= ( const xcomplex newz ){ z /= newz.z; };
-
-  void operator = ( const xcomplex newz ) { z = newz.z; };
-  void operator = ( std::complex<__float128> newz ) { z = newz; };
-  void operator = ( const long double newz ) { z = newz; };
-  
-  unsigned int operator == ( const xcomplex newz ){ return( z == newz.z ); };
-  unsigned int operator != ( const xcomplex newz ){ return( z != newz.z ); };
-
-  friend long double real ( const xcomplex );
-  friend long double imag ( const xcomplex );
-  friend long double abs ( const xcomplex );
-  friend long int ilogbl( const xcomplex );
-  friend xcomplex scalbln( const xcomplex, long int );
-  friend std::ostream& operator << (std::ostream &s, xcomplex &newz);
-};
-
-xcomplex operator / ( const __float128 a, const xcomplex newz ){ return( xcomplex( a / newz.z ) ); };
-xcomplex operator * ( const __float128 a, const xcomplex newz ){ return( xcomplex( a * newz.z ) ); };
-
-std::ostream& operator << ( std::ostream &s, xcomplex &newz ){
-  s << "(" << real( newz ) << "," << imag( newz ) << ")";
-  return( s );
-}
-
-long double real ( const xcomplex newz ){ return( real( newz.z ) ); };
-
-long double imag ( const xcomplex newz ){ return( imag(newz.z) ); };
-
-long double abs ( const xcomplex newz ){ return( abs( std::complex<long double>(real(newz.z),imag(newz.z)) ) ); };
-
-long int ilogbl( const xcomplex newz ){ return( ilogbl( abs( newz ) ) ); };
-
-xcomplex scalbln( const xcomplex z, long int e ){ 
-  xcomplex b ( scalbln( real( z ), e ), scalbln( imag( z ), e ) );
-  return( b );
-}; 
-
-long int PrecisionInt( const xcomplex z ){ return( ilogbl( LDBL_EPSILON ) ); };
-
-long double Precision( const xcomplex z ){ return( LDBL_EPSILON ); };
diff --git a/sandbox/poly/xcomplex_ldouble.h b/sandbox/poly/xcomplex_ldouble.h
deleted file mode 100644
index cd2bbd0..0000000
--- a/sandbox/poly/xcomplex_ldouble.h
+++ /dev/null
@@ -1,71 +0,0 @@
-typedef long double xreal;
-
-struct xcomplex { 
-  std::complex<xreal> z;
-
-  // constants
-  static const long int MAX_EXP = LDBL_MAX_EXP;
-  static const long int MIN_EXP = LDBL_MIN_EXP;
-  static const xreal INFIN = LDBL_MAX;
-  static const ZERO = 0.0;
-
-  // constructor
-  xcomplex () { };
-  xcomplex ( const int a ){ z = std::complex<xreal>(a); };
-  xcomplex ( const double a ) { z = std::complex<xreal>( a ); };                      // needed for constants 1.0
-  xcomplex ( const xreal a ) { z = std::complex<xreal>( a ); };
-  xcomplex ( const xreal a, const xreal b ) { z = std::complex<xreal>( a, b ); };
-  xcomplex ( const std::complex<xreal> newz ){ z = newz; };
-
-  // operations
-  xcomplex operator + ( ){ return( xcomplex( z ) ); };
-  xcomplex operator - ( ){ return( xcomplex( -z ) ); };
-
-  void operator += ( const xcomplex newz ){ z += newz.z; };
-  void operator -= ( const xcomplex newz ){ z -= newz.z; };
-  void operator *= ( const xcomplex newz ){ z *= newz.z; };
-  void operator /= ( const xcomplex newz ){ z /= newz.z; };
-
-  void operator = ( const xcomplex newz ) { z = newz.z; };
-  void operator = ( const std::complex<xreal> newz ) { z = newz; };
-  void operator = ( const xreal newz ) { z = (std::complex<xreal>)(newz); };
-  
-  unsigned int operator == ( const xcomplex newz ){ return( z == newz.z ); };
-  unsigned int operator != ( const xcomplex newz ){ return( z != newz.z ); };
-
-  friend xreal real ( const xcomplex );
-  friend xreal imag ( const xcomplex );
-  friend xreal abs ( const xcomplex );
-  friend long int ilogbl( const xcomplex );
-  friend xcomplex scalbln( const xcomplex, long int );
-  friend std::ostream& operator << (std::ostream &s, xcomplex &newz);
-};
-
-xcomplex operator + ( const xcomplex a, const xcomplex b ){ return( xcomplex( a.z + b.z ) ); };
-xcomplex operator - ( const xcomplex a, const xcomplex b ){ return( xcomplex( a.z - b.z ) ); };
-xcomplex operator * ( const xcomplex a, const xcomplex b ){ return( xcomplex( a.z * b.z ) ); };
-xcomplex operator / ( const xcomplex a, const xcomplex b ){ return( xcomplex( a.z / b.z ) ); };
-xcomplex operator * ( const xreal a, const xcomplex b ){ return( xcomplex( a * b.z ) ); };
-xcomplex operator / ( const xreal a, const xcomplex b ){ return( xcomplex( a / b.z ) ); };
-
-std::ostream& operator << ( std::ostream &s, xcomplex &newz ){
-  s << "(" << real( newz ) << "," << imag( newz ) << ")";
-  return( s );
-}
-
-xreal real ( const xcomplex newz ){ return( real( newz.z ) ); };
-
-xreal imag ( const xcomplex newz ){ return( imag(newz.z) ); };
-
-xreal abs ( const xcomplex newz ){ return( abs( newz.z ) ); };
-
-long int ilogbl( const xcomplex newz ){ return( ilogbl( abs( newz ) ) ); };
-
-xcomplex scalbln( const xcomplex z, long int e ){ 
-  xcomplex b ( scalbln( real( z ), e ), scalbln( imag( z ), e ) );
-  return( b );
-}; 
-
-long int PrecisionInt( const xcomplex z ){ return( ilogbl( LDBL_EPSILON ) ); };
-
-xreal Precision( const xcomplex z ){ return( LDBL_EPSILON ); };
diff --git a/sandbox/poly/xmpcomplex.h b/sandbox/poly/xmpcomplex.h
deleted file mode 100644
index 7a109c1..0000000
--- a/sandbox/poly/xmpcomplex.h
+++ /dev/null
@@ -1,135 +0,0 @@
-#include <limits.h>
-#include <mpfr.h>
-#include <mpc.h>
-#include <gmpxx.h>
-
-#ifdef MPFR_REALS
-typedef mpf_class xreal;
-#else
-typedef double xreal;
-#endif
-
-struct xcomplex {
-  mpc_t z;
-
-  static const mp_rnd_t default_rnd;
-  static const int default_prec = 128;
-  static const long int MAX_EXP;
-  static const long int MIN_EXP;
-  static const double INFIN;
-  static const xcomplex ZERO;
-
-  // constructor
-  xcomplex(){ mpc_init2(z,default_prec); mpc_set_d_d(z,0.0,0.0,default_rnd); }
-#ifdef MPFR_REALS
-  xcomplex(const double a){ mpc_init2(z,default_prec); mpc_set_d(z,a,default_rnd); }
-  xcomplex(const xreal r){ mpc_init2(z,default_prec); mpc_set_f(z,r.get_mpf_t(),default_rnd); };
-  xcomplex(const xreal a,const xreal b){ mpc_init2(z,default_prec); mpc_set_f_f(z,a.get_mpf_t(),b.get_mpf_t(),default_rnd); };
-#else
-  xcomplex(const xreal r){ mpc_init2(z,default_prec); mpc_set_d(z,r,default_rnd); }
-  xcomplex(const xreal a,const xreal b){ mpc_init2(z,default_prec); mpc_set_d_d(z,a,b,default_rnd); }
-#endif
-  xcomplex(const mpc_t newz){ mpc_init2(z,mpc_get_prec(newz)); mpc_set(z,newz,default_rnd); };
-  ~xcomplex() { mpc_clear(z); }
-
-  // operations
-  xcomplex operator + () const { return(xcomplex(z)); };
-  xcomplex operator - () const { xcomplex newz; mpc_neg(newz.z,z,default_rnd); return(newz); };
-
-  void operator += (const xcomplex a){ mpc_add(z,z,a.z,default_rnd); };
-  void operator -= (const xcomplex a){ mpc_sub(z,z,a.z,default_rnd); };
-  void operator *= (const xcomplex a){ mpc_mul(z,z,a.z,default_rnd); };
-  void operator /= (const xcomplex a){ mpc_div(z,z,a.z,default_rnd); };
-  
-  void operator = (const mpc_t newz){ mpc_init2(z,mpc_get_prec(newz)); mpc_set(z,newz,default_rnd) ;  };
-  void operator = (const xcomplex newz){ mpc_set(z,newz.z,default_rnd); };
-
-  unsigned int const operator == (const xcomplex newz) const { return(mpc_cmp(z,newz.z) == 0); };
-  unsigned int operator != (const xcomplex newz) const { return(mpc_cmp(z,newz.z) != 0); };
-
-  void cscalbln(long int);
-};
-
-const mp_rnd_t xcomplex::default_rnd = mpfr_get_default_rounding_mode();
-const long int xcomplex::MAX_EXP = mpfr_get_emax();
-const long int xcomplex::MIN_EXP = mpfr_get_emin();
-const double xcomplex::INFIN = pow(2,xcomplex::MAX_EXP);
-const xcomplex xcomplex::ZERO = xcomplex(0.0);
-
-std::ostream& operator<<(std::ostream& os,const xcomplex& newz){
-  return(os << mpc_get_str(10,mpc_get_prec(newz.z),newz.z,xcomplex::default_rnd));
-  //  return(os << "(" << real(newz) << " " << imag(newz) << ")");
-}
-
-xcomplex operator + (const xcomplex a, const xcomplex b) {
-  xcomplex newz; mpc_add(newz.z,a.z,b.z,xcomplex::default_rnd); return(newz);
-}
-xcomplex operator - (const xcomplex a, const xcomplex b) {
-  xcomplex newz; mpc_sub(newz.z,a.z,b.z,xcomplex::default_rnd); return(newz);
-}
-xcomplex operator * (const xcomplex a, const xcomplex b) {
-  xcomplex newz; mpc_mul(newz.z,a.z,b.z,xcomplex::default_rnd); return(newz);
-}
-xcomplex operator / (const xcomplex a, const xcomplex b) {
-  xcomplex newz; mpc_div(newz.z,a.z,b.z,xcomplex::default_rnd); return(newz);
-}
-
-xreal abs(const xcomplex newz){ 
-  xreal tmp;
-  mpfr_t tmpfr;
-  mpfr_init2(tmpfr,xcomplex::default_prec);
-  mpc_abs(tmpfr,newz.z,xcomplex::default_rnd);
-#ifdef MPFR_REALS
-  mpfr_get_f(tmp.get_mpf_t(),tmpfr,xcomplex::default_rnd);
-#else
-  tmp = mpfr_get_d(tmpfr,xcomplex::default_rnd);
-#endif
-  mpfr_clear(tmpfr);
-  return tmp;
-}
-
-xreal norm(const xcomplex newz){
-  xreal tmp;
-  mpfr_t tmpfr;
-  mpfr_init2(tmpfr,xcomplex::default_prec);
-  mpc_norm(tmpfr,newz.z,xcomplex::default_rnd);
-#ifdef MPFR_REALS
-  mpfr_get_f(tmp.get_mpf_t(),tmpfr,xcomplex::default_rnd);
-#else
-  tmp = mpfr_get_d(tmpfr,xcomplex::default_rnd);
-#endif
-  mpfr_clear(tmpfr);
-  return tmp;
-}
-
-long int ilogbl(const xcomplex newz){
-  long e = INT_MIN;
-  if (mpfr_cmp_si(mpc_realref(newz.z),0) != 0)
-    e = mpfr_get_exp(mpc_realref(newz.z));
-  if (mpfr_cmp_si(mpc_imagref(newz.z),0) != 0)
-    e = max(e,mpfr_get_exp(mpc_imagref(newz.z)));
-  return e;
-}
-
-void xcomplex::cscalbln(long int a){
-  if (a > 0) {
-    mpfr_mul_2ui(mpc_realref(z),mpc_realref(z),a,xcomplex::default_rnd);
-    mpfr_mul_2ui(mpc_imagref(z),mpc_imagref(z),a,xcomplex::default_rnd);
-  } else {
-    mpfr_mul_2ui(mpc_realref(z),mpc_realref(z),-a,xcomplex::default_rnd);
-    mpfr_mul_2ui(mpc_imagref(z),mpc_imagref(z),-a,xcomplex::default_rnd);
-  }
-}
-
-long int PrecisionInt(const xcomplex newz) { return(mpc_get_prec(newz.z)); }
-
-xreal Precision(const xcomplex newz)
-{
-#ifdef MPFR_REALS
-  xreal tmp = 1;
-  mpf_mul_2exp(tmp.get_mpf_t(),tmp.get_mpf_t(),-PrecisionInt(newz));
-  return tmp;
-#else
-  return scalbln(1.0,-PrecisionInt(newz));
-#endif
-}
diff --git a/sandbox/procgroup b/sandbox/procgroup
deleted file mode 100644
index f247661..0000000
--- a/sandbox/procgroup
+++ /dev/null
@@ -1,4 +0,0 @@
-local 0
-localhost 1 pargap
-localhost 1 pargap
-#gauss04.uni-math.gwdg.de 1 .../bin64/pargap
diff --git a/sandbox/pszgrowth.g b/sandbox/pszgrowth.g
deleted file mode 100644
index 7216ee8..0000000
--- a/sandbox/pszgrowth.g
+++ /dev/null
@@ -1,24 +0,0 @@
-a := PSZAlgebra(2);
-d := a.1*a.2-a.2*a.1;
-v := a.2;
-maxn := 20;
-k := GF(2);
-s := [[VectorSpace(k,[],Zero(a)),VectorSpace(k,[v])],[VectorSpace(k,[d])]];
-for n in [4..2*maxn] do
-  for j in [1..n-1] do
-    i := n-j;
-    if not IsBound(s[i]) then s[i] := []; fi;
-    b := [];
-    if i>1 then Append(b,List(Basis(s[i-1][j]),x->x*d-d*x)); fi;
-    if j>1 then Append(b,List(Basis(s[i][j-1]),x->x*v-v*x)); fi;
-    if IsOddInt(i) and IsOddInt(j) then
-      Append(b,List(Basis(s[(i+1)/2][(j+1)/2]),x->x^2));
-    fi;
-    s[i][j] := VectorSpace(k,b,Zero(a));
-  od;
-od;
-x := Indeterminate(Rationals,"x");
-t := Indeterminate(Rationals,"t");
-Sum([1..Length(s)],i->Sum([1..Length(s[i])],j->Dimension(s[i][j])*t^(i-1)*x^(j-1)));
-
-# 2*x^24*t^14+x^23*t^15+2*x^23*t^14+x^23*t^13+x^22*t^14+x^22*t^13+x^21*t^13+x^21*t^12+x^20*t^13+2*x^20*t^12+x^20*t^11+2*x^19*t^12+2*x^19*t^11+x^18*t^12+3*x^18*t^11+2*x^18*t^10+2*x^17*t^11+3*x^17*t^10+x^17*t^9+3*x^16*t^10+2*x^16*t^9+x^15*t^10+2*x^15*t^9+x^15*t^8+x^14*t^9+x^14*t^8+x^13*t^8+x^13*t^7+x^12*t^8+2*x^12*t^7+x^12*t^6+2*x^11*t^7+2*x^11*t^6+x^10*t^7+3*x^10*t^6+x^10*t^5+x^9*t^6+x^9*t^5+x^8*t^5+x^8*t^4+x^7*t^5+2*x^7*t^4+x^7*t^3+2*x^6*t^4+x^6*t^3+x^5*t^3+x^5*t^2+x^4*t^3+2*x^4*t^2+x^3*t^2+x^3*t+x^2*t^2+x^2*t+x^2+x*t+x+t
diff --git a/sandbox/puzzles.g b/sandbox/puzzles.g
deleted file mode 100644
index 8d969f1..0000000
--- a/sandbox/puzzles.g
+++ /dev/null
@@ -1,1354 +0,0 @@
-#  Puzzles_Fr(machine)  finds all puzzle's systems of level 0,
-# note: machine must have f1*f2*..*fn as a relation 
-# and fn must correspond to the infinity loop   
-
-#  here puzzle system is a machine with extra markings:
-#   return rec(
-#      machine := machine,
-#      group0 := group0,           a free group of rank n               
-#      group1 := group1,           a free group of rank m>n
-#      embedding := embedding,     a surjective homomorphism from group0 to group1    
-#      covering := cover,          a covering homomorphism from group1 to group0  
-#      homomorphism := hom,        a homeomorphism from group0 to StateSet(machine)
-#      globallevel := 0,           
-#      levels := List([1..Length(GeneratorsOfGroup(group0))], i->[0]),    list of levels of "puzzle pieces"
-#      refinest := false,
-#      coordinate0 :=coordinate0,     describe cyclic ordering of puzzle piece's sides
-#      coordinate1 := coordinate1     describe cyclic ordering of puzzle piece's sides        
-#   );
-
-#  some properties:
-# embedding("cyclic product of generators") = "cyclic product of generators"
-# embedding(covering( "cyclic product of generators" )) = "cyclic product of generators"^degree;
-
-# for any f in group0  
-# homomorphism(f) is a pre-image of homomorphism(embedding(covering(f)))
-
-# convention: if a is a pullback of b under  puzzle.covering,  
-# then  puzzle.covering(a) =   (b^"degree")^(n*"cyclic product of generators")
-# and n is minimal
-
-
-# for any generator f of a group "group0" embedding(f) "contains" at most one critical generator of group1
-# therefore it is possible to construct a minimal machine that satisfies a given puzzle system
-# the last machine and th first machines are equal if a given puzzle system is complete  
-
-
-# Other functions:
-
-# IsRefinest_Fr := function(puzzle),  check if a puzzle syztem is refinest 
-
-#PuzzleRenormalization_Fr := function(puzzle)
-   # if puzzle.refinest = true, then
-   # return a homomorphism that renormalize puzzle.machine
-
-#PuzzlePullback_Fr := function(puzzle)
-# if puzzle.refinest = false make a pullback of the puzzle system (puzzle.globallevel will increase by 1)
-
-
-
-
-Abelianization_Fr := function(el)
-    local v, i, count;
-    i := 1;
-    v := ExtRepOfObj(el);
-    count := [];
-    for i in [2,4..Length(v)] do
-        if not IsBound(count[v[i-1]]) then count[v[i-1]] := 0; fi;
-        count[v[i-1]] := count[v[i-1]] + v[i];
-    od;
-    for i in [1..Length(count)] do
-        if IsBound(count[i]) and count[i]=0 then
-           Unbind(count[i]);
-        fi;
-    od;
-    return count;
-end;
-
-
-StateByMachine_Fr := function(machine, el, c, set) 
-# find the preimage of an element "el" that is in the region separated by "c" and "set" 
-   local v, i, g, degree, bool, j, b;
-#   if WreathRecursion(a)(el)[2] = [1,2] then 
-#     return WreathRecursion(a)(el)[1][1]*WreathRecursion(a)(el)[1][2];;
-#   fi;
-
-   degree := Length(AlphabetOfFRObject(machine));
-   g := One(GeneratorsOfFRMachine(machine)[1]);
-   for i in [1..degree] do
-      v := ExtRepOfObj(WreathRecursion(machine)(el)[1][i]);
-      v := v{[1,3..Length(v)-1]};
-      if  not IsSubset(c,v) or WreathRecursion(machine)(el)[1][i]=One(GeneratorsOfFRMachine(machine)[1]) then    
-        continue;
-      fi;
-      bool := true; 
-      for j in [1..Length(set)] do
-         b:=Intersection(v,set[j]);
-         if b=[] then continue; fi;
-         if not IsSubset(v,set[j]) then bool:=false; fi;    
-
-      od;
-
-
-      if bool then
-#Print(v,bool,el,c,"\n",c,set,"\n");
-#Print(WreathRecursion(machine)(el)[1][i],"\n\n");
-         return WreathRecursion(machine)(el)[1][i];
-      fi;
-   od;
-   return One(GeneratorsOfFRMachine(machine)[1]);
-end;
-
-
-
-
-LoopPreimagesByFrMachine_Fr := function(machine, el)
-#find all preimages of "el", where "el" is in "StateSet(machine)"
-# every preimage is given in the form: [preimage,degree,coordinate,[admissible coordinates]];
-# coordinate = "admissible coordinates"[1]
-  local a, b, c, s, k, gens, set, group;
-
-  gens := GeneratorsOfFRMachine(machine); 
-  group := StateSet(machine);
-  set := [];
-  for c in Cycles(PermList(Output(machine,el)), AlphabetOfFRObject(machine)) do
-      if Length(c)>1 then
-
-          a := Transition(machine,el,c[Length(c)]); 
-          b := Length(c)-1;
-          while b>0   do  #  ???and Length(Transition(machine,el,c[b])*a)<Length(a) do
-              a := Transition(machine,el,c[b])*a;
-              b := b-1;
-          od;
-
-#          if b>0 then
-#             for k in [1..b] do
-#                 a := a*Transition(machine,el,c[k]);  
-#             od;
-#          fi;    
-          Add(set,[a,Length(c), c[b+1],c]);   
-          continue;
-      fi;
-      Add(set,[Transition(machine,el,c[1]),1,c[1],c]);
-
-  od;
-
-
-
-  return set; 
-end;
-
-PuzzlePartialInclusion_Fr := function(puzzle) # is not working yet
-  local i, j, set, s, gens0, v, k;
-  
-  gens0 := GeneratorsOfGroup(puzzle.group0);
-  set :=[];
-  for i in [1..Length(gens0)] do
-     v := ExtRepOfObj(Image(puzzle.embedding,gens0[i]));
-     v := Set(v{[1,3..Length(v)-1]});
-     Add(set,[v,i]);
-  od; 
-  set := Set(set);
-  s := [set[1]];
-  j :=[s[1]];
-  Print(j);
-  for i in [2..Length(gens0)] do
-    if IsSubset(j[Length(j)][1],set[i][1]) then
-       Add(j[Length(j)],set[i]);
-       Add(j,j[Length(j)][Length(j[Length(j)])]); 
-       continue;
-    fi; 
-    v := false;
-    while not v do
-       Remove(j[Length(j)],1); 
-       Remove(j);
-       if IsSubset(j[Length(j)][1],set[i][1]) then
-          Add(j[Length(j)],set[i]);
-          Add(j,j[Length(j)][Length(j[Length(j)])]); 
-          v := true;
-       fi;
-    od;  
-Print(s,"\n\n");  
-
-  od;
-  while Length(j)> 0 do
-     Remove(j[Length(j)],1);
-     Remove(j);
-  od; 
-  Print(s);
-
-
-
-  return fail;
-end; 
-
-
-
-
-
-IsGraterInAbelianization_Fr := function(el1, el2) 
-    local v, i, count;
-    i := 1;
-    v := ExtRepOfObj(el1);
-    count := [];
-    for i in [2,4..Length(v)] do
-        if not IsBound(count[v[i-1]]) then count[v[i-1]] := 0; fi;
-        count[v[i-1]] := count[v[i-1]] + v[i];
-    od;
-    v := ExtRepOfObj(el2);
-    for i in [2,4..Length(v)] do
-        if not IsBound(count[v[i-1]]) then count[v[i-1]] := 0; fi;
-        count[v[i-1]] := count[v[i-1]] - v[i];
-    od;
-    for i in count do
-       if i < 0 then return false; fi;  
-    od;
-    return true;
-end;
-
-
-
-
-
-
-PullbackHomByMachine_Fr := function(machine, group0, hom) 
-# for an surjective "hom" from "group" to "StateSet(machine)" 
-# it constructs a "puzzle system", if it is possible 
- local i, degree, gens0, set, j, t, k, group, n, gens1, group1, s1, s0, q, cover, embedding, coordinate0, coordinate1, inclus;
- degree := Length(AlphabetOfFRObject(machine));
- gens0 := GeneratorsOfGroup(group0);  
- group := StateSet(machine);
- set:=[];
- coordinate0 := List([1..Length(gens0)],i-> i);
- Add(coordinate0, 1); 
- for i in [1..Length(gens0)] do
-   t := LoopPreimagesByFrMachine_Fr(machine,Image(hom,gens0[i]));
-
-   for j in t do
-      if not j[1]=One(group) then
-         for k in [1..Length(gens0)] do
-
-            if IsGraterInAbelianization_Fr(Image(hom,gens0[k]),j[1]) then
-                Add(set,[j[3],i,j[1],j[4],k]);
-            fi;
-         od;
-         continue;
-      fi;
-      Add(set,[j[3],i,j[1],j[4],false]);
-   od;
-
-
- od;
-
- set :=Set(set);
- n := Length(set);
- group1 := FreeGroup(n);
- gens1 := GeneratorsOfGroup(group1);
- coordinate1 := List([1..degree*Length(coordinate0)],i-> 0);
- for i in [1..Length(set)] do    for j in [1..Length(set)] do
-     if not set[i][5] =false or Length(set[j][4])=1 or set[j][5]=1 
-     then
-        continue;
-     fi;
-     if  set[i][2] < set[j][4][Length(set[j][4])] and set[i][2] > set[j][4][1]
-       or set[i][2] = set[j][4][Length(set[j][4])] and set[i][1]<set[j][1]
-       or set[i][2] = set[j][4][1] and set[i][1]>set[j][1] 
-     then
-          set[i][5] := set[j][5];
-     fi;
-
-  od;   od;
-  i := 1;
-  while i < Length(set) and (set[i][5]= false or set[i][5]=1) do
-     set[i][5] := 1;
-     i := i+1;
-  od;
-
-  i := Length(set);
-  while i >1 and (set[i][5]= false or set[i][5]=1) do
-     set[i][5] := 1;
-     i := i-1;
-  od;
-  q := false;
-  j:=1;
-  for i in [1..Length(set)] do
-     if set[i][5]= false then
-        set[i][5] := j;
-        q := true; 
-        continue;
-     fi;
-     if q then
-        if not j=set[i][5] then 
-            Print("Unable to construct puzzle\n");
-            return fail;
-        fi; 
-     fi; 
-     j := set[i][5];
-     q := false;
-  od;
-
-
-
-  s0 := List([1..Length(gens0)], i->One(group1));
-  s1 := List([1..Length(gens1)], i->One(group0));
-  q := One(group0);
-  for i in [1..Length(gens0)] do
-    q:= gens0[i]*q;
-  od;
-  for i in [1..Length(gens1)] do
-#Print(set[i],"\n");
-     s1[i]:= q^(set[i][1]-1)*gens0[set[i][2]]^Length(set[i][4])*q^(1-set[i][1]);
-     for j in set[i][4] do
-        coordinate1[set[i][2]+Length(coordinate0)*(j-1)]:=i;
-     od;
-     if set[i][2]= 1 then
-       for j in set[i][4] do
-          if j >1 then
-            coordinate1[Length(coordinate0)*(j-1)]:=i;
-          else;
-            coordinate1[Length(coordinate0)*degree]:=i;     
-          fi; 
-       od;
-     fi;
-  od;
-
-  cover := GroupHomomorphismByImages(group1, group0, gens1, s1); 
-
-  i := 1;
-  while i <= Length(gens1) and set[i][5]=1 do
-    s0[set[i][5]]:= gens1[i]*s0[set[i][5]];
-    i:=i+1;
-  od;
-  while i <= Length(gens1) and set[i][5]>1 do
-     s0[set[i][5]]:= gens1[i]*s0[set[i][5]];
-     i:=i+1;
-  od;  
-  q := One(group1);
-  for j in [2..Length(gens0)] do
-     q:= s0[j]*q;
-  od;
-  while i <= Length(gens1)  do
-     s0[1]:= q^-1*gens1[i]*q*s0[1];
-     i:=i+1;
-  od;  
-
-  embedding := GroupHomomorphismByImages(group0, group1, gens0, s0); 
-
-
-
-
-
-   return rec(
-      machine := machine,
-      group0 := group0,
-      group1 := group1,
-      embedding := embedding,
-      covering := cover,
-      homomorphism := hom,
-      globallevel := 0,
-      levels := List([1..Length(gens0)], i->[0]),
-      refinest := false,
-      coordinate0 :=coordinate0,
-      coordinate1 := coordinate1  
-   );
-
-end;
-
-PullbackHomOfPuzzle_Fr := function(puzzle) 
-  # construct a homomorphism from puzzle.group1 to State StateSet(machine)
-  # that is compatible with puzzle.homomorphism
-  local gens0, gens1, set0, set1, i, j, k, t, set, hom;
-  gens0 := GeneratorsOfGroup(puzzle.group0);
-  gens1 := GeneratorsOfGroup(puzzle.group1);
-  set0 := [];
-  set1 := List([1..Length(gens1)],i->One(StateSet(puzzle.machine)));
-  for i in [1..Length(gens1)] do
-     j := Image(puzzle.homomorphism,Image(puzzle.covering,gens1[i]));
-     set1[i] := WreathRecursion(puzzle.machine)(j)[1][1]*set1[i];
-  od; 
-  
-
- return  GroupHomomorphismByImages(puzzle.group1,StateSet(puzzle.machine),gens1,set1);
-end;
-
-
-IsRefinest_Fr := function(puzzle)
-# check if a puzzle syztem is refinest
-
-
- local i, j, set, gens0, gens1, s, hom;
- gens0 := GeneratorsOfGroup(puzzle.group0);
- gens1 := GeneratorsOfGroup(puzzle.group1);
- hom := PullbackHomOfPuzzle_Fr(puzzle);
- set := List([1..Length(gens0)], i ->0);
- for i in [1..Length(gens1)] do
-    if not Image(hom,gens1[i])=One(StateSet(puzzle.machine)) then
-        j := Abelianization_Fr(Image(puzzle.covering,gens1[i])); 
-        set[Position(j,Maximum(j))] := set[Position(j,Maximum(j))] + 1; 
-    fi;
- od;
-
-for i in set do
-   if i>1 then
-      puzzle.refinest := false; 
-      return false; 
-   fi;
-od;
- 
- puzzle.refinest := true; 
- return true; 
-end;
-
-CreatePuzzle_Fr := function(machine, set) # creates puzzle of level 0; 
-  local  i, j, q, group, subgroup, group0, group1, gens, gens0, gens1, cover, embedding, hom,
-        s, s0, s1, set2, v, n;
-  set2 :=[];
-#Print(set,"\n");
-  for i in [1..Length(set)] do
-     q :=[];
-     for j in [1..Length(set[i])] do
-         v := ExtRepOfObj(set[i][j]);
-         v := Set(v{[1,3..Length(v)-1]});
-         Add(q,v);
-     od;
-     set2:=Union(set2,q);
-  od;
-
-  if Length(set2)>1 then 
-     Remove(set2,2);  # in this case set2[2] is the union of the rest
-  fi; 
-
-
-  gens := GeneratorsOfFRMachine(machine); 
-  n := Length(gens)-1;
-  group := StateSet(machine);
-  s0 := [];
-  s1 := [];
-  s  := List([1..Length(set2)+2], i ->One(group));
-
-  j := 0;
-
-  for i in [1..n] do 
-     if j<=Length(set2)-1 and not i in set2[j+1] then
-         s[j+1]:=gens[i]*s[j+1]; 
-         continue;
-     fi;
-     if j=Length(set2) and i in set2[j] then
-         s[j+1]:=gens[i]*s[j+1]; 
-         continue;
-     fi;
-     if j<=Length(set2) then j:=j+1; fi;
-     s[j+1]:=gens[i]*s[j+1]; 
-  od;
-  q := One(group); 
-  for j in [2..Length(set2)+1] do
-    q:=s[j]*q;
-  od;
-  s[1] := q^-1*s[Length(s)]*q*s[1];
-  Remove(s); 
-
-  group0 := FreeGroup(Length(s));
-  gens0 := GeneratorsOfGroup(group0); 
-
-  hom := GroupHomomorphismByImages(group0,group,gens0,s);
-
-
-
-
-  return PullbackHomByMachine_Fr(machine, group0, hom);
-end;
-
-
-Puzzles_Fr := function(machine) # we assume that the last generator is the adding element (a loop around infinity)
-
-
-  local a, v, b, s, ss, c, t, n, image, admaddresses, criticalpoints, criticalvalues, gens, i, j, k, m, group, degree, puzzles;
-  gens := GeneratorsOfFRMachine(machine); 
-  group := StateSet(machine);
-  t:=ADMADDRESSES_FR(machine);  
-  if t = [fail,fail] then return fail; fi;
-  admaddresses := t[2];
-  image := t[1];  
-  n:=Length(gens)-1;
-  criticalpoints :=[];
-  criticalvalues :=[];
-  puzzles := [];
-
-# looking for "critical points and values" 
-  for s in [1..Length(gens)-1] do
-        for c in Cycles(PermList(Output(machine,gens[s])), AlphabetOfFRObject(machine)) do
-            if Length(c)>1 then
-                ss:=[];
-                t:=[]; 
-                for k in [1..Length(c)] do
-                   v := ExtRepOfObj(Transition(machine,gens[s],c[k]));
-                   v := v{[1,3..Length(v)-1]};
-                   if Length(v)<>Length(Set(v)) then return fail; Print("It is not an IMG machine!!"); fi;
-                   Add(ss,v);
-                   Add(t,Transition(machine,gens[s],c[k]));  
-                od;    
-                Add(criticalpoints,ss);
-                Add(criticalvalues,t);   
-
-            fi;
-
-        od;
-  od;
-
-
- # looking for \alpha fixed points 
-
-
- for i in [1..Length(criticalvalues)] do
-   for k in [1..Length(criticalvalues[i])-1] do 
-      if criticalvalues[i][k]= One(group) then continue; fi;
-      ss:=[];
-      t :=[criticalvalues[i][k]];
-      for j in [1..Length(criticalvalues)] do
-         if j=i then continue; fi;
-         if IsSubset(criticalpoints[i][Length(criticalpoints[k])],criticalpoints[j][Length(criticalpoints[j])]) then
-             Add(ss,criticalpoints[j][Length(criticalpoints[j])]);
-             Add(t,criticalvalues[j][Length(criticalpoints[j])]);
-         fi;
-      od; 
-      b:=[];
-      for m in t do
-         a :=[];
-         s := StateByMachine_Fr(machine,m,criticalpoints[i][k],ss);
-         while not s in a do
-             Add(a,s);
-             s:=  StateByMachine_Fr(machine,s,criticalpoints[i][k],ss);     
-         od; 
-         if s = One(group) then continue; fi;
-         c:= Position(a,s);
-         Add(b,a{[c,c+1..Length(a)]}); 
-      od;
-
-      if b = [] then continue; fi;
-
-#Print(Preimage_Fr(machine,criticalvalues[i][k],criticalpoints[i][Length(criticalpoints[k])],ss));
-    #  Print(i,t,"\n",Puzzle_Fr(machine,b),"\n\n");
-       Add(puzzles, CreatePuzzle_Fr(machine,b));
-
-   od;
-  od;
-
-
-
-
-#cover, embedding
-
-
-
-#  Print(criticalpoints,criticalvalues);
-
- return puzzles;
-end; 
-
-
-PuzzleRenormalization_Fr := function(puzzle)
-   # if puzzle.refinest = true, then
-   # return a homomorphism that renormalize puzzle.machine
-
-   local gens0, gens, gr;
-  
-   IsRefinest_Fr(puzzle);
-   if not puzzle.refinest = true then
-      return fail;
-   fi;
-   gens0 := GeneratorsOfGroup(puzzle.group0);
-   gr := FreeGroup(Length(gens0));
-  
-   return  GroupHomomorphismByImages(gr,StateSet(puzzle.machine),GeneratorsOfGroup(gr),Image(puzzle.homomorphism,gens0));
-
-end;
-
-PartialPullbackOfOrdering_Fr := function(group0, subset, group1, embedding) 
-# return a list of generators
-# subset is in GeneratorsOfGroup(group0);
-# embedding("cyclic product of generators") = "cyclic product of generators"
-
-
-   local  i, j, sub0, sub1, gens0, gens1, n, m, gr, subgr, s, hom, v, order;
-   sub0  := List([1..Length(subset)], i->ExtRepOfObj(subset[i])[1]);
-   gens0 := GeneratorsOfGroup(group0);
-   gens1 := GeneratorsOfGroup(group1); 
-   sub1 :=  List([1..Length(subset)],i->[Image(embedding,subset[i]),i]); 
-   sub1 := Set(sub1);
-   order := List([1..Length(gens1)],i->gens1[i]);
-   v := [];
-   for s in sub1 do
-       Add(order,s, Position(order,gens1[ExtRepOfObj(s[1])[1]]));  
-       j :=  Abelianization_Fr(s[1]);
-       for i in [1..Length(j)] do
-         if not IsBound(j[i]) then continue; fi;
-         Add(v,i);         
-       od;
-   od;
-   for i in v do 
-     Remove(order,Position(order,gens1[i]));
-   od;   
-########################################################################################### 
-#searching for bugs:
-   j := One(group1);
-   for i in order do 
-     if i in gens1 then
-       j := i*j; 
-     else
-       j := i[1]*j;
-     fi;
-   od;
-   for i in gens1 do 
-     j := j*i^-1; 
-   od;  
-  if not  j = One(group1) then
-      Print("there is a bug in PartialPullbackOfOrdering_Fr");
-      return fail;
-  fi;
-
-###########################################################################################
-  for i in [1..Length(order)] do 
-     if not order[i] in gens1 then
-        order[i] := subset[order[i][2]];
-     fi;
-   od;
-
-
-
-return order;
-
-
-
-
-########################################################################################### 
-#Print(sub1,"\n\n",order,"\n\n",v); return fail;
-#   j := One(group1);
-#   for i in subset do
-#       j := j* Image(embedding, i);
-#   od;
-#   j :=  Abelianization_Fr(j);
-#  
-#   for i in [1..Length(j)] do
-#       if not IsBound(j[i]) then continue; fi;
-#       Remove(order,Position(order,i));
-#   od;
-#   n := Length(sub0);
-#   m := Length(sub1);
-
-###########################################################################################
-#   gr := FreeGroup(n+m);
-#   s := [];
-#   for i in sub0 do
-#     Add(s,Image(embedding,gens0[i]));
-#   od;
-#   for i in sub1 do
-#     Add(s,gens1[i]);
-#   od;
-#   subgr := Subgroup(group1,s);
-#
-#
-#
-#   j := One(group1);
-#
-#   for i in gens1 do
-#       j := i*j;
-#   od;
-#Print(j, "\n",Length(s),"\n",subgr,"\n", j in subgr); return fail;
-
-
-###################################################################################
-#   i := ShortGroupWordInSet(subgr,j,Length(s)); 
-###########################################################################################
-   if Length(i)= 1 then return fail; fi;
-   i := i[2];
-   v := ExtRepOfObj(i);  
-   v := v{[1,3..Length(v)-1]};
-   j := [];
-   for i in v do
-     if i<=n then
-        Add(j,gens0[sub0[i]],1);
-     else
-        Add(j,gens1[sub1[i-n]],1);
-     fi;
-   od;
-   return j;
-end;
-
-
-PuzzlePullback_Fr := function(puzzle)
-# if puzzle.refinest = false make a pullback of the puzzle system
- local a, b, q, i, j, v,  sets,  set1,  set,  gens0, gens1, newgens1, newgens0, order, ss, info, image, preim0, preimset0, preimset, 
- degree, s, s2, hom,  n, m, k, newgroup0, newhomomorphism, newcovering, newembedding, t, newgroup1, iteration, newlevels, inclus, bool;
- IsRefinest_Fr(puzzle);
- if puzzle.refinest then return false; fi;
-
- degree := Length(AlphabetOfFRObject(puzzle.machine)); 
- gens0 := GeneratorsOfGroup(puzzle.group0);
- gens1 := GeneratorsOfGroup(puzzle.group1);
- hom := PullbackHomOfPuzzle_Fr(puzzle);
- 
- sets := List([1..Length(gens0)], i ->[]);
- set := List([1..Length(gens0)], i ->0);
- image := List([1..Length(gens1)], i ->0);
-
-# searching for reducible puzzle pieces: 
-
- for i in [1..Length(gens0)] do     
-    v := Abelianization_Fr(Image(puzzle.embedding,gens0[i]));
-  
-    for j in [1..Length(v)] do
-       if not IsBound(v[j]) then continue; fi;
-       s := Image(hom,gens1[j]);
-       Add(sets[i], j);
-       image[j] := i;
-       if not s=One(StateSet(puzzle.machine)) then       
-           set[i] := set[i] + 1; 
-       fi;       
-    od;
- od;
-
- s := [];
-
- for i in [1..Length(gens0)] do
-    if set[i] = 1 then 
-       Add(s,gens0[i]);
-    fi;
-  od;
-
-  order := PartialPullbackOfOrdering_Fr(puzzle.group0, s, puzzle.group1, puzzle.embedding); 
-
-  n := Length(order);  
-  newgroup0 := FreeGroup(n);
-  newgens0 := GeneratorsOfGroup(newgroup0);
-
-# use puzzle.machine: 
- t :=[];
- m := 0; 
- set1 := []; 
- for i in order do
-   if i in gens0 then
-      Add(t,Image(puzzle.homomorphism, i));
-      k := LoopPreimagesByFrMachine_Fr(puzzle.machine,t[Length(t)]);
-      Add(set1,k);
-      m := m+Length(k);
-   else
-      Add(t,Image(hom, i));
-      k := LoopPreimagesByFrMachine_Fr(puzzle.machine,t[Length(t)]);
-      Add(set1,k);
-      m := m+Length(k);
-   fi;
- od; 
-preim0 := List([1..Length(gens0)],i->[]);
- for i in [1..Length(gens0)] do
-    k := LoopPreimagesByFrMachine_Fr(puzzle.machine,Image(puzzle.homomorphism,gens0[i]));
-    for j in k do
-       Add(preim0[i],j[4]); 
-    od;
-    preim0[i] := Set(preim0[i]);
- od; 
-
-
-
-
-
-#  create newcovering:
-
- newhomomorphism := GroupHomomorphismByImages(newgroup0,StateSet(puzzle.machine),GeneratorsOfGroup(newgroup0),t);
-
- newgroup1 := FreeGroup(m);
- newgens1 := GeneratorsOfGroup(newgroup1);
- 
- q := One(newgroup0); 
- for j in [1..Length(newgens0)] do
-   q:=newgens0[j]*q;
- od;
-
- j :=1;
- s :=[];
- info := []; 
-
- for t in [1..degree] do
-    for i in [1..Length(set1)] do  #??? make a copy of set1?
-      if Length(set1[i])=0 then continue; fi;
-      if  not set1[i][1][3] = t then continue; fi;
-      Add(s, q^(t-1)*newgens0[i]^set1[i][1][2]*q^(1-t));
-      Add(info,[i,[t]]); #????Add(info,[i,set1[i][1][4]]);
-      Remove(set1[i],1);
-    od;
-  od;
-
- newcovering := GroupHomomorphismByImages(newgroup1,newgroup0,newgens1,s);   
-
-
- newlevels :=[];
- q := [];
- for i in order do
-    if i in gens0 then
-       Add(q, Image(puzzle.embedding, gens0[Position(gens0,i)]));
-       Add(newlevels,ShallowCopy(puzzle.levels[Position(gens0,i)]));
-    else
-       j := Abelianization_Fr(Image(puzzle.covering,gens1[Position(gens1,i)]));
-       Add(q, gens1[Position(j, Maximum(j))]);
-       Add(newlevels,ShallowCopy(puzzle.levels[Position(
-             j, Maximum(j)
-           )])); 
-       Add(newlevels[Length(newlevels)],puzzle.globallevel+1);
-    fi; 
-
- od;
-
-
-a :=[];
-for i in order do
-   if i in puzzle.group1 then
-     Add(a,i);
-   else
-     Add(a,Image(puzzle.embedding,i));
-   fi;
-od;
-inclus := GroupHomomorphismByImages(newgroup0,puzzle.group1,newgens0,a);
-
- 
-
-  preimset0:= List([1..Length(gens0)],i->[]);
-  for i in [1..Length(gens1)] do
-    k := Abelianization_Fr(Image(puzzle.covering,gens1[i]));
-    a := preimset0[Position(k,Maximum(k))];
-    for j in [1..Maximum(k)] do 
-       Add(a,i);
-    od;
-  od;
-
-  preimset := List([1..Length(order)],i->[]);
-  for i in [1..Length(order)] do
-     if order[i] in gens0 then 
-       preimset[i]:=ShallowCopy(preimset0[Position(gens0,order[i])]);
-     else
-       preimset[i]:=ShallowCopy(preimset0[image[Position(gens1,order[i])]]);
-     fi;
-  od;
-  
-
-  set := List([1..n], i ->One(newgroup1));
-  set1 := List([1..n], i ->One(newgroup1)); 
-  #set2 := One(newgens1); #set2 := List([1..n], i ->One(newgroup1)); 
-  
-  v:=List([1..n], i ->0);
-  ss:= [1];   
-  s2 := List([1..Length(gens1)], i ->0);
-  k := 2;
-
-  for i in [1..m] do
-
-      j :=info[i][1];
-      s := j; 
-      q := 2;
-      bool := false;
-      while not bool do 
-        for t in [1..Length(preimset[s])] do     
-           if bool then continue; fi;
-           j := preimset[s][t];          
-           if gens1[j] in order then
-              j := Position(order,gens1[j]);
-           else
-             j := Position(order,gens0[image[j]]);
-           fi;
-           if j=ss[Length(ss)] then 
-               bool := true;
-               a := t; 
-           fi;
-         od;
-         if bool then
-            Remove(preimset[s],a); 
-         fi;
-         if q=1 and bool then
-           k:=k+1;
-           continue;  
-         fi;
-         if bool then continue; fi;
-         if q=2 and k<=n then
-            Add(ss,k);
-            q:=1;
-            continue;
-         fi;
-         if q=1 then
-            Remove(ss);
-            Remove(ss);   
-            q:=0;
-            continue;
-         fi; 
-         Remove(ss);
-         if Length(ss)=0 then
-               Print("bug"); return fail;
-         fi;
-      od;
-     
-      if v[j]>0 and v[j]+1<i then
-         a := List([1..i-v[j]-1], b->s2[v[j]+b]);   
-
-         for q in [Minimum(a)..Maximum(a)] do
-             set1[j]:=set[q]*set1[j];
-         od;
-      fi;
-      v[j] := i;
-      s2[i] := j; 
-      set[j] := set1[j]^-1*newgens1[i]*set1[j]* set[j];
-  od;
-
-
-
-  newembedding := GroupHomomorphismByImages(newgroup0,newgroup1,newgens0,set);
-
-###################################
-
-#Print(inclus);
-for i in newgens0 do
-
- #  j := LoopPreimagesByFrMachine_Fr(puzzle.machine,Image(newhomomorphism,Image(newcovering,Image(newembedding,i) )))[1][1];
- #  q := Image(newhomomorphism,i);
-   j := Image(inclus,Image(newcovering,Image(newembedding,i) ));
-   q := Image(puzzle.embedding,Image(puzzle.covering, Image(inclus,i)));
- 
-   if not j=q then
-     Print(i,"\n\n",Abelianization_Fr(j),"\n",Abelianization_Fr(q));#
-#  Print("\n\n",Image(puzzle.covering, Image(inclus,i)),"\n\n",Image(puzzle.embedding,Image(puzzle.covering, Image(inclus,i))),"\n");#
-#     Print("\n\n\n\n",j,"\n\n",q,"\n\n\n",Image(newembedding,i),"\n\n",Image(newembedding,i),"mist\n\n\n");#Image(newembedding,i)
-Print("\nthere is a bug somewhere\n");
-   fi;
- 
-od;
-#Print(Image(newembedding,newgens0[1]),"\n",Abelianization_Fr(Image(newembedding,newgens0[1])) );
-##################################
-  v := One(newgroup1);
-   for i in [1..m] do
-     v := newgens1[i]*v;
-   od;
-   q := One(newgroup0);
-   for i in [1..n] do
-     q := newgens0[i]*q;
-   od;
-
-#Print("\n\n\n", Image(newembedding,newgens0[14]),"\n",Image(newembedding,newgens0[15]));
-#Print(ss);
-
-
-
-##################????? search for bugs:
- 
-   if not  v^degree = Image(newembedding, Image(newcovering,v)) then
-#Display(Image(newembedding, Image(newcovering,v))); 
-     Print(Abelianization_Fr(Image(newembedding, Image(newcovering,v))),"there is a bug somewhere");
-     return fail;
-   fi;
-##################?????  
-  
-
- return  rec(
-      machine := puzzle.machine,
-      group0 := newgroup0,              
-      group1 := newgroup1,           
-      embedding := newembedding,    
-      covering := newcovering,          
-      homomorphism := newhomomorphism,       
-      globallevel := puzzle.globallevel +1,           
-      levels := newlevels,   
-      refinest := false           
-   ); 
-end;
-
-
-CreateIMGMachineFromPuzzle_Fr := function(puzzle)
-# create a new img machine that is approximate puzzle.machine
-# by the first return of critical points
-
- local i, j, v, q, k, a, b,  sets,  set1, set0, set2, set3, set4, set,  gens0, gens1, image, hom,  
- degree, s, inclus, bool;
- #IsRefinest_Fr(puzzle);
- #if puzzle.refinest then return false; fi;
-
- degree := Length(AlphabetOfFRObject(puzzle.machine)); 
- gens0 := GeneratorsOfGroup(puzzle.group0);
- gens1 := GeneratorsOfGroup(puzzle.group1);
-
- sets := List([1..Length(gens0)], i ->[]);
- set := [];
- inclus := List([1..Length(gens1)], i ->0);
- image := List([1..Length(gens1)], i ->0);
- hom := PullbackHomOfPuzzle_Fr(puzzle);
-
- for i in [1..Length(gens0)] do     
-    v := Abelianization_Fr(Image(puzzle.embedding,gens0[i]));
-  
-    for j in [1..Length(v)] do
-       if not IsBound(v[j]) then continue; fi;
-       if not Image(hom,gens1[j])=One(StateSet(puzzle.machine)) then   
-          Add(sets[i], j);          
-       fi;
-       inclus[j] := i; 
-    od;
- od;
-
- set1 :=[];
- set0 :=[];
-
- for i in [1..Length(gens1)] do     
-    v := Abelianization_Fr(Image(puzzle.covering,gens1[i]));
-    j := Maximum(v);
-    image[i]:= Position(v,j);
-    if j > 1 then 
-      Add(set,[i,j]);
-
-      v := LoopPreimagesByFrMachine_Fr(puzzle.machine, Image(puzzle.homomorphism, gens0[image[i]]));
-#Print(Int((Length(ExtRepOfObj(Image(puzzle.covering,gens1[i])))/2+1)/Length(gens0)/2));
-      for k in v do
-#Print(k[4],"\n");
-          a := Int((Length(ExtRepOfObj(Image(puzzle.covering,gens1[i])))/2+1)/Length(gens0)/2) +1;
-          if  a in k[4] 
-          then
-             Add(set1,k[4]-a);
-          fi;
-      od;
-    fi;  
- od;
-#Print(set1,"\n");
-#Print(sets,"\nimage",image,"\ninclus",inclus,"\nset",set,"\n\n"); 
-#Print(inclus,"\n",image,"\n",sets,"\n\n");
-  set2 :=[]; 
-  set3 :=[];
-  set4 :=[];
-
-  for i in set do 
-     q := [sets[image[i[1]]]];
-     j:= i[1];#Image(puzzle.embedding,gens0[image[i[1]]]);
-     v := sets[image[j]];
-     
-     while not i[1] in v do
-        a := []; 
-        for j in v do
-           a := Union(a,sets[image[j]]); 
-        od;  
-        Add(q,a,1);
-        v := a;
-     od;   
-     Add(set0,q);
-  od;
-
-  for i in [1..Length(set0)] do
-    q:=[];
-    a := set[i][1];#Position(set1[i][1],Maximum(set1[i][1]));
-    Add(q,a,1);
-    for j in [2..Length(set0[i])] do
-       bool := false;
-       for k in [1..Length(set0[i][j])]do
-           if a in sets[image[set0[i][j][k]]]  then
-               if bool then 
-                   Print("IMGMachine is not unique");
-                   continue; 
-               fi;  
-               bool := true;
-               a := set0[i][j][k];
-               Add(q,a,1);
-           fi; 
-
-       od;
-
-    od;
-    Add(q,set[i][1],1);
-    Add(set2,q);
-  od;
-
-
-
-
-
-  for i in [1..Length(set2)] do
-     q:=[];
-
-     for j in [1..Length(set2[i])-1] do
-       Add(q,
-              Int( (Length(ExtRepOfObj(Image(puzzle.covering,gens1[set2[i][j]])))/2+1)/Length(gens0)/2 ),
-            1);
-           
-     od;
-     Add(set3,q);
-  od;
-
-  for i in [1..Length(set2)] do
-
-     q:=0;
-     a:=1;
-     for j in [1..Length(set3[i])] do       
-       q := a*set3[i][j]+q;  
-       a := a*degree;  
-     od;
-     Add(set4,[]);
-     for j in set1[i] do
-        Add(set4[i],q/(a-1)+j/degree);
-     od;
-  od;
-
-
-
-  return [degree,set4,[]];
-end;
-
-
-
-CreateIMGMachineFromPuzzleOld_Fr := function(puzzle) #wrong algorithm
-# create a new img machine that is approximate puzzle.machine
-# by the first return of critical points
-
- local i, j, v, q, k, a, b,  sets,  set1, set2, set3, set4, set,  gens0, gens1, image,  
- degree, s, inclus, bool;
- #IsRefinest_Fr(puzzle);
- #if puzzle.refinest then return false; fi;
-
- degree := Length(AlphabetOfFRObject(puzzle.machine)); 
- gens0 := GeneratorsOfGroup(puzzle.group0);
- gens1 := GeneratorsOfGroup(puzzle.group1);
-
- sets := List([1..Length(gens0)], i ->[]);
- set := [];
- inclus := List([1..Length(gens1)], i ->0);
- image := List([1..Length(gens1)], i ->0);
-
-# searching for reducible puzzle pieces: 
-
- for i in [1..Length(gens0)] do     
-    v := Abelianization_Fr(Image(puzzle.embedding,gens0[i]));
-  
-    for j in [1..Length(v)] do
-       if not IsBound(v[j]) then continue; fi;
-       Add(sets[i], j);
-       inclus[j] := i;
-    od;
- od;
-
-
- for i in [1..Length(gens1)] do     
-    v := Abelianization_Fr(Image(puzzle.covering,gens1[i]));
-    j := Maximum(v);
-    if j > 1 then 
-      Add(set,[i,j]);
-    fi;
-    image[i]:= Position(v,j);
- od;
-
-#Print(inclus,"\n",image,"\n",sets,"\n\n");
-  set1 :=[];
-  set2 :=[]; 
-  set3 :=[];
-  set4 :=[];
-  for i in set do 
-     q := [];
-     j:= Image(puzzle.embedding,gens0[image[i[1]]]);
-     v := Abelianization_Fr(j);
-     
-     while not IsBound(v[i[1]]) do
-        Add(q,v,1);
-        j := Image(puzzle.embedding,Image(puzzle.covering,j));
-        v := Abelianization_Fr(j);
-
-     od;
-    
-     Add(set1,q);
-  od;
- # Print(set1,"\n\n");
-
-  for i in [1..Length(set1)] do
-    q:=[];
-    a := set[i][1];#Position(set1[i][1],Maximum(set1[i][1]));
-    Add(q,a,1);
-    for j in [1..Length(set1[i])] do
-       bool := false;
-       for k in [1..Length(set1[i][j])]do
-           if not IsBound(set1[i][j][k]) then continue; fi;
-           if a in sets[image[k]] then
-               if bool then 
-                   Print("IMGMachine is not unique");
-                   continue; 
-               fi;  
-               bool := true;
-               a := k;
-               Add(q,a,1);
-           fi; 
-
-       od;
-
-    od;
-    Add(set2,q);
-  od;
- 
-
-  for i in [1..Length(set1)] do
-     q:=[];
-
-     for j in [1..Length(set2[i])] do
-
-       Add(q,
-              Int( (Length(ExtRepOfObj(Image(puzzle.covering,gens1[set2[i][j]])))/2+1)/Length(gens0)/2 ),
-            1);
-           
-     od;
-     Add(set3,q);
-  od;
-
-
-  for i in [1..Length(set1)] do
-
-     q:=0;
-     a:=1;
-     for j in [1..Length(set3[i])] do       
-       q := a*set3[i][j]+q;  
-       a := a*degree;  
-     od;
-     Add(set4,q/(a-1));
-  od;
-
-
-
-#Print(set2,"\n\n");
-#Print(set3,"\n\n",degree);
-  return set4;
-end;
-
-
-CreateIMGMachineFromPuzzleOld2_Fr := function(puzzle) #wrong algorithm
-# create a new img machine that is approximate puzzle.machine
-# by the first return of critical points
-
- local i, j, v, q, k, a, b,  sets,  set1, set2, set3, set4, set,  gens0, gens1, image, hom,  
- degree, s, inclus, bool;
- #IsRefinest_Fr(puzzle);
- #if puzzle.refinest then return false; fi;
-
- degree := Length(AlphabetOfFRObject(puzzle.machine)); 
- gens0 := GeneratorsOfGroup(puzzle.group0);
- gens1 := GeneratorsOfGroup(puzzle.group1);
-
- sets := List([1..Length(gens0)], i ->[]);
- set := [];
- inclus := List([1..Length(gens1)], i ->0);
- image := List([1..Length(gens1)], i ->0);
- hom := PullbackHomOfPuzzle_Fr(puzzle);
-# searching for reducible puzzle pieces: 
-
- for i in [1..Length(gens0)] do     
-    v := Abelianization_Fr(Image(puzzle.embedding,gens0[i]));
-  
-    for j in [1..Length(v)] do
-       if not IsBound(v[j]) then continue; fi;
-       if not Image(hom,gens1[j])=One(StateSet(puzzle.machine)) then   
-          Add(sets[i], j);          
-       fi;
-       inclus[j] := i; 
-    od;
- od;
-
- set1 :=[];
- 
-
- for i in [1..Length(gens1)] do     
-    v := Abelianization_Fr(Image(puzzle.covering,gens1[i]));
-    j := Maximum(v);
-    image[i]:= Position(v,j);
-    if j > 1 then 
-      Add(set,[i,j]);
-
-      v := LoopPreimagesByFrMachine_Fr(puzzle.machine, Image(puzzle.homomorphism, gens0[image[i]]));
-#Print(Int((Length(ExtRepOfObj(Image(puzzle.covering,gens1[i])))/2+1)/Length(gens0)/2));
-      for k in v do
-#Print(k[4],"\n");
-          a := Int((Length(ExtRepOfObj(Image(puzzle.covering,gens1[i])))/2+1)/Length(gens0)/2) +1;
-          if  a in k[4] 
-          then
-             Add(set1,k[4]-a);
-          fi;
-      od;
-    fi;  
- od;
-#Print(set1,"\n");
-#Print(sets,"\nimage",image,"\ninclus",inclus,"\nset",set); return fail;
-#Print(inclus,"\n",image,"\n",sets,"\n\n");
-  set2 :=[]; 
-  set3 :=[];
-  set4 :=[];
-  for i in set do 
-     q := [i[1]];
-     j:= image[i[1]];#Image(puzzle.embedding,gens0[image[i[1]]]);
-    # v := Abelianization_Fr(j);
-     
-     while not i[1] in sets[j] do
-        #j := inclus[j]; 
-        if Length(sets[j])> 1 then
-           Print("IMGMachine is not unique");
-           return fail; 
-        fi;
-        j := sets[j][1];
-        Add(q,j);
-        j:= image[j];
-     od;
-    
-     Add(set2,q);
-  od;
- # Print(set1,"\n\n");
-
-#  for i in [1..Length(set1)] do
-#    q:=[];
-#    a := set[i][1];#Position(set1[i][1],Maximum(set1[i][1]));
-#    Add(q,a,1);
-#    for j in [1..Length(set1[i])] do
-#       bool := false;
-#       for k in [1..Length(set1[i][j])]do
-#           if not IsBound(set1[i][j][k]) then continue; fi;
-#           if a in sets[image[k]] then
-#               if bool then 
-#                   Print("IMGMachine is not unique");
-#                   continue; 
-#               fi;  
-#               bool := true;
-#               a := k;
-#               Add(q,a,1);
-#           fi; 
-#
-#       od;
-#
-#    od;
-#    Add(set2,q);
-#  od;
- 
-
-  for i in [1..Length(set2)] do
-     q:=[];
-
-     for j in [1..Length(set2[i])] do
-
-       Add(q,
-              Int( (Length(ExtRepOfObj(Image(puzzle.covering,gens1[set2[i][j]])))/2+1)/Length(gens0)/2 ),
-            1);
-           
-     od;
-     Add(set3,q);
-  od;
-
-
-  for i in [1..Length(set2)] do
-
-     q:=0;
-     a:=1;
-     for j in [1..Length(set3[i])] do       
-       q := a*set3[i][j]+q;  
-       a := a*degree;  
-     od;
-     Add(set4,[]);
-     for j in set1[i] do
-        Add(set4[i],q/(a-1)+j/degree);
-     od;
-  od;
-
-
-
-#Print(set2,"\n\n");
-#Print(set3,"\n\n",degree);
-  return [degree,set4,[]];
-end;
\ No newline at end of file
diff --git a/sandbox/puzzles.remarks b/sandbox/puzzles.remarks
deleted file mode 100644
index 175b126..0000000
--- a/sandbox/puzzles.remarks
+++ /dev/null
@@ -1,64 +0,0 @@
-
- The code about puzzles  that I wrote so far is in the attached file.
- So far the program does not do a lot..., but what it can do or may do is the following:
-
-1) Puzzles_Fr(machine)    creates list of  "puzzle system" of level 0;
-so far puzzles are of the following form:
-
-#   return rec(
-#      machine := machine,
-#      group0 := group0,           a free group of rank n
-#      group1 := group1,           a free group of rank m>n
-#      embedding := embedding,     a surjective homomorphism from group0 to group1
-#      covering := cover,          a covering homomorphism from group1 to group0
-#      homomorphism := hom,        a homeomorphism from group0 to StateSet(machine)
-#      globallevel := 0,
-#      levels := List([1..Length(GeneratorsOfGroup(group0))], i->[0]),    list of levels of "puzzle pieces"
-#      refinest := false,
-#      coordinate0 :=coordinate0,     describe cyclic ordering of puzzle piece's sides
-#      coordinate1 := coordinate1     describe cyclic ordering of puzzle piece's sides
-#   );
-
-#  some properties:
-# embedding("cyclic product of generators") = "cyclic product of generators"
-# embedding(covering( "cyclic product of generators" )) = "cyclic product of generators"^degree;
-
-# for any f in group0
-# homomorphism(f) is a pre-image of homomorphism(embedding(covering(f)))
-
-# convention: if a is a pullback of b under  puzzle.covering,
-# then  puzzle.covering(a) =   (b^"degree")^(n*"cyclic product of generators")
-# and n is minimal
-
-the last two fields (coordinate0 ,coordinate1) are useless in the current version.
-
-
-2) PuzzlePullback_Fr(puzzle) takes one pullback of puzzle system;
-currently it has a mistake, but it is possible to fix. Usually it works, and in the end the function verifies the result and if it is not correct returns "fail";
-
-Remark: if a piece contains only one post-critical point, then the function does not subdivide this puzzle piece. Therefore the number of puzzle pieces
-(or the number of generators of group1)  is bounded by degree*#(post-critical set)
-
-3)IsRefinest_Fr := function(puzzle)   check if a puzzle syztem is "refinest"
-
-4)PuzzleRenormalization_Fr := function(puzzle) so far it is the only useless application of the code.
-  # if puzzle.refinest = true, then
-  # return a homomorphism that renormalize puzzle.machine
-
-5) CreateIMGMachineFromPuzzle_Fr     does not work mostly,
-one of the purposes of writing the code was to for any given puzzle system try to find the minimal (or one of the minimal)
-polynomials that satisfy this puzzle piece. kind of 'approximate" the initial polynomial by "smaller" polynomials. I tried several approaches,
-it does not seems to work mostly. (unicritical case is easy).
-
-
-And as I was saying it may be possible to check whether one polynomial is smaller than another. But I did not try to implement that.
-
-I guess I will continue working on this code later.
-
-Dima
-
-
-
-
-
-
diff --git a/sandbox/qr_complex.c b/sandbox/qr_complex.c
deleted file mode 100644
index cd601d8..0000000
--- a/sandbox/qr_complex.c
+++ /dev/null
@@ -1,316 +0,0 @@
-/* linalg/qr.c
- * 
- * Copyright (C) 1996, 1997, 1998, 1999, 2000 Gerard Jungman, Brian Gough
- * 
- * This program is free software; you can redistribute it and/or modify
- * it under the terms of the GNU General Public License as published by
- * the Free Software Foundation; either version 2 of the License, or (at
- * your option) any later version.
- * 
- * This program is distributed in the hope that it will be useful, but
- * WITHOUT ANY WARRANTY; without even the implied warranty of
- * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE.  See the GNU
- * General Public License for more details.
- * 
- * You should have received a copy of the GNU General Public License
- * along with this program; if not, write to the Free Software
- * Foundation, Inc., 51 Franklin Street, Fifth Floor, Boston, MA 02110-1301, USA.
- */
-
-/* Author:  G. Jungman */
-
-
-//#include <config.h>
-#include <stdlib.h>
-#include <string.h>
-#include <gsl/gsl_math.h>
-#include <gsl/gsl_vector.h>
-#include <gsl/gsl_matrix.h>
-#include <gsl/gsl_blas.h>
-
-#include <gsl/gsl_linalg.h>
-
-int gsl_linalg_complex_QR_decomp (gsl_matrix_complex * A, gsl_vector_complex * tau);
-int gsl_linalg_complex_QR_lssolve (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, const gsl_vector_complex * b, gsl_vector_complex * x, gsl_vector_complex * residual);
-int gsl_linalg_complex_QR_svx (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_vector_complex * x);
-int gsl_linalg_complex_QR_QTvec (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_vector_complex * v);
-int gsl_linalg_complex_QR_Qvec (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_vector_complex * v);
-int gsl_linalg_complex_QR_unpack (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_matrix_complex * Q, gsl_matrix_complex * R);
-
-/* Factorise a general M x N matrix A into
- *  
- *   A = Q R
- *
- * where Q is orthogonal (M x M) and R is upper triangular (M x N).
- *
- * Q is stored as a packed set of Householder transformations in the
- * strict lower triangular part of the input matrix.
- *
- * R is stored in the diagonal and upper triangle of the input matrix.
- *
- * The full matrix for Q can be obtained as the product
- *
- *       Q = Q_k .. Q_2 Q_1
- *
- * where k = MIN(M,N) and
- *
- *       Q_i = (I - tau_i * v_i * v_i')
- *
- * and where v_i is a Householder vector
- *
- *       v_i = [1, m(i+1,i), m(i+2,i), ... , m(M,i)]
- *
- * This storage scheme is the same as in LAPACK.  */
-
-int
-gsl_linalg_complex_QR_decomp (gsl_matrix_complex * A, gsl_vector_complex * tau)
-{
-  const size_t M = A->size1;
-  const size_t N = A->size2;
-
-  if (tau->size != GSL_MIN (M, N))
-    {
-      GSL_ERROR ("size of tau must be MIN(M,N)", GSL_EBADLEN);
-    }
-  else
-    {
-      size_t i;
-
-      for (i = 0; i < GSL_MIN (M, N); i++)
-        {
-          /* Compute the Householder transformation to reduce the j-th
-             column of the matrix to a multiple of the j-th unit vector */
-
-          gsl_vector_complex_view c_full = gsl_matrix_complex_column (A, i);
-          gsl_vector_complex_view c = gsl_vector_complex_subvector (&(c_full.vector), i, M-i);
-
-          gsl_complex tau_i = gsl_complex_conjugate(gsl_linalg_complex_householder_transform (&(c.vector)));
-
-          gsl_vector_complex_set (tau, i, tau_i);
-
-          /* Apply the transformation to the remaining columns and
-             update the norms */
-
-          if (i + 1 < N)
-            {
-              gsl_matrix_complex_view m = gsl_matrix_complex_submatrix (A, i, i + 1, M - i, N - (i + 1));
-              gsl_linalg_complex_householder_hm (tau_i, &(c.vector), &(m.matrix));
-            }
-        }
-
-      return GSL_SUCCESS;
-    }
-}
-
-/* Solves the system A x = b in place using the QR factorisation,
-
- *  R x = Q^T b
- *
- * to obtain x. Based on SLATEC code. 
- */
-
-int
-gsl_linalg_complex_QR_svx (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_vector_complex * x)
-{
-
-  if (QR->size1 != QR->size2)
-    {
-      GSL_ERROR ("QR matrix must be square", GSL_ENOTSQR);
-    }
-  else if (QR->size1 != x->size)
-    {
-      GSL_ERROR ("matrix size must match x/rhs size", GSL_EBADLEN);
-    }
-  else
-    {
-      /* compute rhs = Q^T b */
-
-      gsl_linalg_complex_QR_QTvec (QR, tau, x);
-
-      /* Solve R x = rhs, storing x in-place */
-
-      gsl_blas_ztrsv (CblasUpper, CblasNoTrans, CblasNonUnit, QR, x);
-
-      return GSL_SUCCESS;
-    }
-}
-
-
-/* Find the least squares solution to the overdetermined system 
- *
- *   A x = b 
- *  
- * for M >= N using the QR factorization A = Q R. 
- */
-
-int
-gsl_linalg_complex_QR_lssolve (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, const gsl_vector_complex * b, gsl_vector_complex * x, gsl_vector_complex * residual)
-{
-  const size_t M = QR->size1;
-  const size_t N = QR->size2;
-
-  if (M < N)
-    {
-      GSL_ERROR ("QR matrix must have M>=N", GSL_EBADLEN);
-    }
-  else if (M != b->size)
-    {
-      GSL_ERROR ("matrix size must match b size", GSL_EBADLEN);
-    }
-  else if (N != x->size)
-    {
-      GSL_ERROR ("matrix size must match solution size", GSL_EBADLEN);
-    }
-  else if (M != residual->size)
-    {
-      GSL_ERROR ("matrix size must match residual size", GSL_EBADLEN);
-    }
-  else
-    {
-      gsl_matrix_complex_const_view R = gsl_matrix_complex_const_submatrix (QR, 0, 0, N, N);
-      gsl_vector_complex_view c = gsl_vector_complex_subvector(residual, 0, N);
-
-      gsl_vector_complex_memcpy(residual, b);
-
-      /* compute rhs = Q^T b */
-
-      gsl_linalg_complex_QR_QTvec (QR, tau, residual);
-
-      /* Solve R x = rhs */
-
-      gsl_vector_complex_memcpy(x, &(c.vector));
-
-      gsl_blas_ztrsv (CblasUpper, CblasNoTrans, CblasNonUnit, &(R.matrix), x);
-
-      /* Compute residual = b - A x = Q (Q^T b - R x) */
-      
-      gsl_vector_complex_set_zero(&(c.vector));
-
-      gsl_linalg_complex_QR_Qvec(QR, tau, residual);
-
-      return GSL_SUCCESS;
-    }
-}
-
-/* Form the product Q^T v  from a QR factorized matrix 
- */
-
-int
-gsl_linalg_complex_QR_QTvec (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_vector_complex * v)
-{
-  const size_t M = QR->size1;
-  const size_t N = QR->size2;
-
-  if (tau->size != GSL_MIN (M, N))
-    {
-      GSL_ERROR ("size of tau must be MIN(M,N)", GSL_EBADLEN);
-    }
-  else if (v->size != M)
-    {
-      GSL_ERROR ("vector size must be N", GSL_EBADLEN);
-    }
-  else
-    {
-      size_t i;
-
-      /* compute Q^T v */
-
-      for (i = 0; i < GSL_MIN (M, N); i++)
-        {
-          gsl_vector_complex_const_view c = gsl_matrix_complex_const_column (QR, i);
-          gsl_vector_complex_const_view h = gsl_vector_complex_const_subvector (&(c.vector), i, M - i);
-          gsl_vector_complex_view w = gsl_vector_complex_subvector (v, i, M - i);
-          gsl_complex ti = gsl_vector_complex_get (tau, i);
-          gsl_linalg_complex_householder_hv (ti, &(h.vector), &(w.vector));
-        }
-      return GSL_SUCCESS;
-    }
-}
-
-
-int
-gsl_linalg_complex_QR_Qvec (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_vector_complex * v)
-{
-  const size_t M = QR->size1;
-  const size_t N = QR->size2;
-
-  if (tau->size != GSL_MIN (M, N))
-    {
-      GSL_ERROR ("size of tau must be MIN(M,N)", GSL_EBADLEN);
-    }
-  else if (v->size != M)
-    {
-      GSL_ERROR ("vector size must be N", GSL_EBADLEN);
-    }
-  else
-    {
-      size_t i;
-
-      /* compute Q^T v */
-
-      for (i = GSL_MIN (M, N); i > 0 && i--;)
-        {
-          gsl_vector_complex_const_view c = gsl_matrix_complex_const_column (QR, i);
-          gsl_vector_complex_const_view h = gsl_vector_complex_const_subvector (&(c.vector), 
-                                                                i, M - i);
-          gsl_vector_complex_view w = gsl_vector_complex_subvector (v, i, M - i);
-          gsl_complex ti = gsl_vector_complex_get (tau, i);
-          gsl_linalg_complex_householder_hv (ti, &h.vector, &w.vector);
-        }
-      return GSL_SUCCESS;
-    }
-}
-
-
-/*  Form the orthogonal matrix Q from the packed QR matrix */
-
-int
-gsl_linalg_complex_QR_unpack (const gsl_matrix_complex * QR, const gsl_vector_complex * tau, gsl_matrix_complex * Q, gsl_matrix_complex * R)
-{
-  const size_t M = QR->size1;
-  const size_t N = QR->size2;
-
-  if (Q->size1 != M || Q->size2 != M)
-    {
-      GSL_ERROR ("Q matrix must be M x M", GSL_ENOTSQR);
-    }
-  else if (R->size1 != M || R->size2 != N)
-    {
-      GSL_ERROR ("R matrix must be M x N", GSL_ENOTSQR);
-    }
-  else if (tau->size != GSL_MIN (M, N))
-    {
-      GSL_ERROR ("size of tau must be MIN(M,N)", GSL_EBADLEN);
-    }
-  else
-    {
-      size_t i, j;
-
-      /* Initialize Q to the identity */
-
-      gsl_matrix_complex_set_identity (Q);
-
-      for (i = GSL_MIN (M, N); i > 0 && i--;)
-        {
-          gsl_vector_complex_const_view c = gsl_matrix_complex_const_column (QR, i);
-          gsl_vector_complex_const_view h = gsl_vector_complex_const_subvector (&c.vector,
-                                                                i, M - i);
-          gsl_matrix_complex_view m = gsl_matrix_complex_submatrix (Q, i, i, M - i, M - i);
-          gsl_complex ti = gsl_vector_complex_get (tau, i);
-          gsl_linalg_complex_householder_hm (gsl_complex_conjugate(ti), &h.vector, &m.matrix);
-        }
-
-      /*  Form the right triangular matrix R from a packed QR matrix */
-
-      for (i = 0; i < M; i++)
-        {
-          for (j = 0; j < i && j < N; j++)
-            gsl_matrix_complex_set (R, i, j, gsl_complex_rect(0.0, 0.0));
-
-          for (j = i; j < N; j++)
-            gsl_matrix_complex_set (R, i, j, gsl_matrix_complex_get (QR, i, j));
-        }
-
-      return GSL_SUCCESS;
-    }
-}
diff --git a/sandbox/rabbit-12 b/sandbox/rabbit-12
deleted file mode 100644
index c1b59a3..0000000
--- a/sandbox/rabbit-12
+++ /dev/null
@@ -1,20866 +0,0 @@
-# gnuplot data -- maxpcset=11 type=rabbit
-0.1125381028	0.3644828469	1/8192	0.00012207
-0.1128393629	0.3644646967	3/16384	0.000183105
-0.1129947834	0.3647719872	1/4096	0.000244141
-0.1132035345	0.3647257217	5/16384	0.000305176
-0.1133765513	0.3647558604	3/8192	0.000366211
-0.1136200216	0.3648561119	7/16384	0.000427246
-0.1135656481	0.3651473745	1/2048	0.000488281
-0.1136255192	0.3653193514	1/2046	0.000488759
-0.1136410495	0.3652661946	1/2044	0.000489237
-0.1136539604	0.3652351799	1/2040	0.000490196
-0.1136665212	0.3652117467	1/2032	0.000492126
-0.1136803961	0.3651909273	1/2016	0.000496032
-0.113697673	0.3651698304	1/1984	0.000504032
-0.1137222117	0.3651454596	1/1920	0.000520833
-0.1137588547	0.3651274804	9/16384	0.000549316
-0.1137636334	0.3651120654	1/1792	0.000558036
-0.1138381617	0.3650987729	5/8192	0.000610352
-0.1138577847	0.3650447917	1/1536	0.000651042
-0.1139053106	0.3650174679	11/16384	0.000671387
-0.1140594459	0.3651370277	3/4096	0.000732422
-0.1142556322	0.3651408278	13/16384	0.000793457
-0.1143767755	0.3652726386	7/8192	0.000854492
-0.1144562481	0.3654592237	15/16384	0.000915527
-0.1142922635	0.365646741	1/1024	0.000976562
-0.1142922635	0.365646741	1/1024	0.000976562
-0.1144994557	0.365673102	17/16384	0.0010376
-0.1145519864	0.3656383831	9/8192	0.00109863
-0.1145772963	0.3655868467	19/16384	0.00115967
-0.1146568197	0.3656002153	5/4096	0.0012207
-0.1146941665	0.3655429672	21/16384	0.00128174
-0.1147467082	0.3654935445	11/8192	0.00134277
-0.1149075293	0.3654112227	23/16384	0.00140381
-0.114946742	0.3656497562	3/2048	0.00146484
-0.1149760102	0.3657710116	1/682	0.00146628
-0.1149995026	0.3657384665	3/2044	0.00146771
-0.115017355	0.3657169671	1/680	0.00147059
-0.1150351661	0.3656984761	3/2032	0.00147638
-0.1150569169	0.3656791889	1/672	0.0014881
-0.1150897584	0.3656546661	3/1984	0.0015121
-0.115117928	0.3656656484	25/16384	0.00152588
-0.1151578306	0.3656126434	1/640	0.0015625
-0.1152102014	0.3656647744	13/8192	0.00158691
-0.1153431473	0.3656216614	27/16384	0.00164795
-0.1153714813	0.3658395621	7/4096	0.00170898
-0.1154733557	0.3659735472	29/16384	0.00177002
-0.1154726735	0.3660975839	15/8192	0.00183105
-0.1154578219	0.3662410329	31/16384	0.00189209
-0.1152370259	0.3663308118	1/512	0.00195312
-0.1152370259	0.3663308118	1/512	0.00195312
-0.1154733512	0.3664468002	33/16384	0.00201416
-0.1155220864	0.3663998086	17/8192	0.0020752
-0.1155372473	0.3663519794	35/16384	0.00213623
-0.1155958815	0.3663499129	9/4096	0.00219727
-0.1156110387	0.366309632	37/16384	0.0022583
-0.1156318209	0.3662784179	19/8192	0.00231934
-0.1156852476	0.3662337882	39/16384	0.00238037
-0.1157391423	0.3662971773	5/2048	0.00244141
-0.115791771	0.3663191462	5/2046	0.00244379
-0.1157853963	0.3663010832	5/2044	0.00244618
-0.1157820507	0.3662884684	1/408	0.00245098
-0.1157799561	0.3662766417	5/2032	0.00246063
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-0.1157788312	0.3662425969	5/1984	0.00252016
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-0.1196975133	0.3685070681	177/16384	0.0108032
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-0.1206216059	0.3683594862	23/2016	0.0114087
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-0.1202440302	0.3695480866	193/16384	0.0117798
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-0.1205068379	0.3692348211	23/1920	0.0119792
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-0.1205237658	0.3691739661	99/8192	0.012085
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-0.1206693412	0.369078958	25/2016	0.0124008
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-0.1208693398	0.3690143052	103/8192	0.0125732
-0.1209375442	0.3690256272	25/1984	0.0126008
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-0.1209100485	0.369175684	13/1024	0.0126953
-0.1210415284	0.3691978115	209/16384	0.0127563
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-0.1211128087	0.369048228	5/384	0.0130208
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-0.121498309	0.3690634552	9/680	0.0132353
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-0.1218666154	0.3693369328	55/4096	0.0134277
-0.1218720724	0.3696384083	221/16384	0.0134888
-0.1217455655	0.3697823094	111/8192	0.0135498
-0.1215331882	0.3698778435	27/1984	0.0136089
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-0.1213975255	0.3696924378	7/512	0.0136719
-0.1212907028	0.3700330671	225/16384	0.0137329
-0.1213995358	0.3700403656	113/8192	0.0137939
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-0.1216833311	0.3702808553	233/16384	0.0142212
-0.1217305092	0.3702655775	29/2032	0.0142717
-0.1217244192	0.3702838565	117/8192	0.0142822
-0.1217762472	0.3702627545	235/16384	0.0143433
-0.1219633124	0.3703138211	29/2016	0.0143849
-0.121816899	0.3703593048	59/4096	0.0144043
-0.1219009524	0.370490259	237/16384	0.0144653
-0.1218761584	0.3706390147	119/8192	0.0145264
-0.1217047517	0.3707530737	239/16384	0.0145874
-0.1215929348	0.3707268028	29/1984	0.0146169
-0.1216010142	0.3706104053	15/1024	0.0146484
-0.1216010142	0.3706104053	15/1024	0.0146484
-0.1214804492	0.3707532697	241/16384	0.0147095
-0.1215151082	0.3708074341	121/8192	0.0147705
-0.1215600162	0.3708402991	243/16384	0.0148315
-0.1215344168	0.3709037686	61/4096	0.0148926
-0.1215648137	0.3709618591	245/16384	0.0149536
-0.1215814142	0.3709604181	23/1536	0.014974
-0.1215932755	0.3710195422	123/8192	0.0150146
-0.1215712819	0.3711751166	247/16384	0.0150757
-0.1214302105	0.3712156775	29/1920	0.0151042
-0.1214232762	0.371104962	31/2048	0.0151367
-0.1213045827	0.3711179406	1/66	0.0151515
-0.1213204479	0.3711612812	31/2044	0.0151663
-0.1213272738	0.3712079599	31/2040	0.0151961
-0.1213234026	0.3712009817	249/16384	0.0151978
-0.1213119127	0.3712860542	31/2032	0.0152559
-0.1213123137	0.3712694402	125/8192	0.0152588
-0.1213276373	0.3713630541	251/16384	0.0153198
-0.1211356825	0.3713975274	31/2016	0.015377
-0.1211805587	0.3713866011	63/4096	0.0153809
-0.1210401295	0.3714850821	253/16384	0.0154419
-0.1208764912	0.3715355799	127/8192	0.0155029
-0.1205269101	0.3714920055	255/16384	0.015564
-0.1207083335	0.3710244832	1/64	0.015625
-0.1207083335	0.3710244832	1/64	0.015625
-0.1195541415	0.3702218848	257/16384	0.015686
-0.1192465441	0.3714290504	129/8192	0.0157471
-0.119809124	0.3718209118	259/16384	0.0158081
-0.1199912368	0.3724365218	65/4096	0.0158691
-0.1204514669	0.3723440605	261/16384	0.0159302
-0.1206728032	0.3722071548	131/8192	0.0159912
-0.1209606913	0.3720906686	263/16384	0.0160522
-0.1211471799	0.3722727411	33/2048	0.0161133
-0.1213183939	0.37216969	1/62	0.016129
-0.1212720899	0.3721350752	33/2044	0.0161448
-0.1212685039	0.3721387128	31/1920	0.0161458
-0.1212465629	0.3721060956	265/16384	0.0161743
-0.1212447393	0.3720908537	11/680	0.0161765
-0.1212339321	0.3720943417	29/1792	0.016183
-0.1212286687	0.3720415767	133/8192	0.0162354
-0.1212361377	0.3720191603	33/2032	0.0162402
-0.1211993486	0.3720105563	25/1536	0.016276
-0.12118874	0.371979174	267/16384	0.0162964
-0.1212758579	0.3719157639	67/4096	0.0163574
-0.1213283263	0.3718946079	11/672	0.016369
-0.1213351704	0.3718251854	269/16384	0.0164185
-0.1214080015	0.3717866563	135/8192	0.0164795
-0.1215042599	0.3717885303	271/16384	0.0165405
-0.1215333992	0.3718816885	17/1024	0.0166016
-0.1215333992	0.3718816885	17/1024	0.0166016
-0.1216447098	0.3718234985	33/1984	0.0166331
-0.1216202721	0.3718071169	273/16384	0.0166626
-0.1215997635	0.3717770553	137/8192	0.0167236
-0.1215771735	0.3717605698	275/16384	0.0167847
-0.1215878879	0.3717304721	69/4096	0.0168457
-0.1215722301	0.3717060974	277/16384	0.0169067
-0.1215559921	0.3716840365	139/8192	0.0169678
-0.1215440934	0.3716118935	279/16384	0.0170288
-0.1216252982	0.3716299647	35/2048	0.0170898
-0.1216814009	0.3716173916	35/2046	0.0171065
-0.1216731806	0.3715971492	5/292	0.0171233
-0.1216717596	0.37158021	281/16384	0.0171509
-0.1216700639	0.3715736309	7/408	0.0171569
-0.1216575612	0.3715570763	11/640	0.0171875
-0.1216791094	0.3715463639	141/8192	0.0172119
-0.1216827764	0.3715321478	35/2032	0.0172244
-0.1216803713	0.3714953537	283/16384	0.0172729
-0.121752349	0.3715091814	71/4096	0.017334
-0.1217933729	0.371509867	5/288	0.0173611
-0.1218146838	0.3715044758	285/16384	0.017395
-0.1218552833	0.3715191072	143/8192	0.0174561
-0.121900603	0.3715528391	287/16384	0.0175171
-0.121869458	0.3716233262	9/512	0.0175781
-0.121869458	0.3716233262	9/512	0.0175781
-0.1220175959	0.3716020997	289/16384	0.0176392
-0.1220062516	0.3715861276	35/1984	0.0176411
-0.121982628	0.3715618814	145/8192	0.0177002
-0.1219598135	0.3715470051	291/16384	0.0177612
-0.1219657364	0.3715227228	73/4096	0.0178223
-0.1219528221	0.371509112	293/16384	0.0178833
-0.1219426655	0.3714989927	147/8192	0.0179443
-0.1219334322	0.3714728437	295/16384	0.0180054
-0.121960971	0.3714653285	37/2048	0.0180664
-0.1219719019	0.3714432186	37/2046	0.0180841
-0.1219623859	0.3714420284	37/2044	0.0181018
-0.1219564545	0.371439133	297/16384	0.0181274
-0.1219534637	0.3714392488	37/2040	0.0181373
-0.1219458228	0.371432868	149/8192	0.0181885
-0.1219401142	0.3714315193	37/2032	0.0182087
-0.1219370641	0.3714336528	7/384	0.0182292
-0.1219302932	0.3714319818	299/16384	0.0182495
-0.1219288629	0.3714037512	75/4096	0.0183105
-0.1219168536	0.3713776011	37/2016	0.0183532
-0.1219116202	0.3713631199	301/16384	0.0183716
-0.1219194404	0.3713110401	151/8192	0.0184326
-0.1220019416	0.3712690917	303/16384	0.0184937
-0.1220257908	0.3713435034	19/1024	0.0185547
-0.1220257908	0.3713435034	19/1024	0.0185547
-0.1221030232	0.371311333	305/16384	0.0186157
-0.1220890617	0.3712920502	37/1984	0.0186492
-0.1221002545	0.3712796263	153/8192	0.0186768
-0.1220874937	0.371253902	307/16384	0.0187378
-0.1221159876	0.3712305068	77/4096	0.0187988
-0.1221188937	0.3711924196	309/16384	0.0188599
-0.1221097145	0.3711878119	29/1536	0.0188802
-0.1221234225	0.3711516742	155/8192	0.0189209
-0.1222118278	0.3710770322	311/16384	0.0189819
-0.1222375411	0.371184061	39/2048	0.019043
-0.1222825683	0.3712284931	13/682	0.0190616
-0.1222963914	0.3712089251	39/2044	0.0190802
-0.1223125414	0.3712014471	313/16384	0.019104
-0.1223165093	0.3711917291	13/680	0.0191176
-0.1223458112	0.3711912399	157/8192	0.019165
-0.1223642143	0.3711772011	39/2032	0.0191929
-0.1223883049	0.3711699448	315/16384	0.0192261
-0.1224467684	0.3712345847	37/1920	0.0192708
-0.1224121048	0.3712304273	79/4096	0.0192871
-0.122461154	0.3712699362	13/672	0.0193452
-0.1224553174	0.3712717546	317/16384	0.0193481
-0.1224780319	0.3713110486	159/8192	0.0194092
-0.1224990001	0.3713835875	319/16384	0.0194702
-0.1223865737	0.3714133063	5/256	0.0195312
-0.1223865737	0.3714133063	5/256	0.0195312
-0.1224220136	0.3718494326	321/16384	0.0195923
-0.1226662445	0.3714739683	161/8192	0.0196533
-0.122652684	0.3714348602	39/1984	0.0196573
-0.1226054583	0.3714244288	323/16384	0.0197144
-0.1226239651	0.3713755414	81/4096	0.0197754
-0.122603232	0.3713503915	325/16384	0.0198364
-0.1225900267	0.3713336806	163/8192	0.0198975
-0.1225828422	0.3712987041	327/16384	0.0199585
-0.1226155108	0.3712913768	41/2048	0.0200195
-0.1226242658	0.3712658783	41/2046	0.0200391
-0.1226142314	0.3712660884	41/2044	0.0200587
-0.1226087657	0.3712629514	329/16384	0.0200806
-0.1226046379	0.3712642373	41/2040	0.020098
-0.1225982809	0.3712575641	165/8192	0.0201416
-0.1225900205	0.371257475	41/2032	0.0201772
-0.1225900683	0.3712582388	31/1536	0.0201823
-0.1225840191	0.3712564094	331/16384	0.0202026
-0.1225841425	0.3712329174	83/4096	0.0202637
-0.1225726441	0.3712116132	13/640	0.0203125
-0.1225739904	0.3712041983	333/16384	0.0203247
-0.1225683194	0.3712010988	41/2016	0.0203373
-0.1225788729	0.3711771947	167/8192	0.0203857
-0.1226069502	0.3711501541	335/16384	0.0204468
-0.122637881	0.3711761928	21/1024	0.0205078
-0.122637881	0.3711761928	21/1024	0.0205078
-0.1226584726	0.3711268123	337/16384	0.0205688
-0.1226416578	0.3711187502	169/8192	0.0206299
-0.1226351609	0.3711173884	37/1792	0.0206473
-0.1226323848	0.3711190399	41/1984	0.0206653
-0.1226269629	0.3711180159	339/16384	0.0206909
-0.1226222458	0.3711012908	85/4096	0.020752
-0.1226060759	0.3710958866	341/16384	0.020813
-0.122590504	0.3710931087	171/8192	0.020874
-0.1225505698	0.3710707867	343/16384	0.0209351
-0.1225982495	0.3710342106	43/2048	0.0209961
-0.1226256327	0.3709939295	43/2046	0.0210166
-0.1226056723	0.3709848602	43/2044	0.0210372
-0.1225957258	0.370970726	345/16384	0.0210571
-0.1225835893	0.370971704	43/2040	0.0210784
-0.1225729639	0.3709410146	173/8192	0.0211182
-0.1225421204	0.3709324849	43/2032	0.0211614
-0.1225203792	0.3709064309	347/16384	0.0211792
-0.122599583	0.3708271629	87/4096	0.0212402
-0.1226998498	0.3707332849	349/16384	0.0213013
-0.1227130634	0.3706143033	43/2016	0.0213294
-0.122860254	0.3707265036	41/1920	0.0213542
-0.1228101742	0.3707357132	175/8192	0.0213623
-0.1229183408	0.370817027	351/16384	0.0214233
-0.1228437245	0.3709379226	11/512	0.0214844
-0.1228437245	0.3709379226	11/512	0.0214844
-0.1231022715	0.37099107	353/16384	0.0215454
-0.1230785677	0.370894191	177/8192	0.0216064
-0.1230488184	0.370844316	355/16384	0.0216675
-0.1230472351	0.3708305488	43/1984	0.0216734
-0.1230862092	0.3708002749	89/4096	0.0217285
-0.1230805035	0.3707624983	39/1792	0.0217634
-0.1230723556	0.3707536358	357/16384	0.0217896
-0.1230591123	0.3707174778	179/8192	0.0218506
-0.1230660759	0.3706323254	359/16384	0.0219116
-0.1231569307	0.3706567036	45/2048	0.0219727
-0.1232262457	0.370618587	15/682	0.0219941
-0.1232010871	0.3705952103	45/2044	0.0220157
-0.1231979411	0.3705705132	361/16384	0.0220337
-0.1231768279	0.3705690024	3/136	0.0220588
-0.1231793275	0.370528736	181/8192	0.0220947
-0.1231341459	0.3705194202	45/2032	0.0221457
-0.1231296911	0.3704908273	363/16384	0.0221558
-0.1231989695	0.3703889907	91/4096	0.0222168
-0.123288544	0.3701754255	365/16384	0.0222778
-0.12354641	0.370059319	183/8192	0.0223389
-0.1239399232	0.3704400497	43/1920	0.0223958
-0.1238998269	0.3703640913	367/16384	0.0223999
-0.1236310805	0.3705629366	23/1024	0.0224609
-0.1236310805	0.3705629366	23/1024	0.0224609
-0.1238479409	0.3708045321	369/16384	0.022522
-0.1239493309	0.3707650384	185/8192	0.022583
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-0.124175339	0.3707132297	45/1984	0.0226815
-0.1241246687	0.3707941156	93/4096	0.0227051
-0.1242621548	0.3708032966	373/16384	0.0227661
-0.124279863	0.3707704191	35/1536	0.0227865
-0.1243993438	0.3708273478	187/8192	0.0228271
-0.1245738402	0.371136889	375/16384	0.0228882
-0.1242738498	0.3711652964	47/2048	0.0229492
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-0.1242199879	0.3713364332	47/2044	0.0229941
-0.124220199	0.3713758747	377/16384	0.0230103
-0.1242796198	0.3713981089	47/2040	0.0230392
-0.1242533149	0.3714579324	189/8192	0.0230713
-0.1243352578	0.3715857408	47/2032	0.0231299
-0.1243150859	0.3715572547	379/16384	0.0231323
-0.124175418	0.3716350844	95/4096	0.0231934
-0.1240802554	0.3717692031	381/16384	0.0232544
-0.1239427913	0.3718574619	47/2016	0.0233135
-0.1239798253	0.371856455	191/8192	0.0233154
-0.1237397667	0.37194704	383/16384	0.0233765
-0.1236741394	0.3715980162	3/128	0.0234375
-0.1236741394	0.3715980162	3/128	0.0234375
-0.1229126909	0.3714760687	385/16384	0.0234985
-0.1228741481	0.3722614226	193/8192	0.0235596
-0.1233838239	0.3724655437	387/16384	0.0236206
-0.1239436322	0.3725860652	97/4096	0.0236816
-0.1240776021	0.3724517273	47/1984	0.0236895
-0.1239875521	0.3723751952	389/16384	0.0237427
-0.1240205019	0.3722759614	195/8192	0.0238037
-0.1241287045	0.3721788222	391/16384	0.0238647
-0.1242159067	0.3722600242	49/2048	0.0239258
-0.1242981974	0.3722217367	49/2046	0.0239492
-0.1242765256	0.3721964117	7/292	0.0239726
-0.1242797111	0.372183773	393/16384	0.0239868
-0.1242729499	0.3721762684	43/1792	0.0239955
-0.1242612381	0.3721644266	49/2040	0.0240196
-0.1242722394	0.3721480894	197/8192	0.0240479
-0.1242564026	0.3721283257	37/1536	0.0240885
-0.1242507901	0.3721104737	395/16384	0.0241089
-0.1242513479	0.3720961058	49/2032	0.0241142
-0.1243068827	0.3720748827	99/4096	0.0241699
-0.1243603408	0.3720137931	397/16384	0.024231
-0.1244219326	0.3719910628	199/8192	0.024292
-0.1244571849	0.3719993394	7/288	0.0243056
-0.1245065413	0.3720145058	399/16384	0.024353
-0.1244962696	0.3721011199	25/1024	0.0244141
-0.1244962696	0.3721011199	25/1024	0.0244141
-0.1246131124	0.3720736317	401/16384	0.0244751
-0.1246074341	0.3720629152	47/1920	0.0244792
-0.124601227	0.3720368975	201/8192	0.0245361
-0.1245845291	0.3720129179	403/16384	0.0245972
-0.1246050592	0.3719874592	101/4096	0.0246582
-0.1246024849	0.3719631058	49/1984	0.0246976
-0.1245979029	0.3719561129	405/16384	0.0247192
-0.1245873223	0.3719293131	203/8192	0.0247803
-0.1245924601	0.3718456588	407/16384	0.0248413
-0.1246806042	0.3718936622	51/2048	0.0249023
-0.1247561076	0.3718964625	17/682	0.0249267
-0.1247543903	0.3718611861	51/2044	0.0249511
-0.1247696669	0.3718527273	409/16384	0.0249634
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-0.1247940057	0.3718085458	205/8192	0.0250244
-0.1248185286	0.3717319979	411/16384	0.0250854
-0.1248373481	0.3716811051	51/2032	0.0250984
-0.1249235911	0.3717925035	103/4096	0.0251465
-0.1250318687	0.3718414678	413/16384	0.0252075
-0.1250823063	0.3719051647	207/8192	0.0252686
-0.125111064	0.37196861	17/672	0.0252976
-0.1251086931	0.3720149846	415/16384	0.0253296
-0.1249771553	0.372058316	13/512	0.0253906
-0.1249771553	0.372058316	13/512	0.0253906
-0.1252541305	0.3722864029	417/16384	0.0254517
-0.1252237078	0.3721544907	209/8192	0.0255127
-0.1252280039	0.3721249378	49/1920	0.0255208
-0.1252069462	0.3720948117	419/16384	0.0255737
-0.1252516925	0.3720650862	105/4096	0.0256348
-0.125252325	0.3720224874	421/16384	0.0256958
-0.1252474535	0.3720182871	51/1984	0.0257056
-0.1252496021	0.3719921305	211/8192	0.0257568
-0.1252724609	0.3719337802	423/16384	0.0258179
-0.1253297501	0.3719648845	53/2048	0.0258789
-0.1253824764	0.3719387104	53/2046	0.0259042
-0.1253644964	0.3719189857	53/2044	0.0259295
-0.1253703575	0.3719086041	425/16384	0.0259399
-0.1253461084	0.3718950024	53/2040	0.0259804
-0.1253586293	0.371880329	213/8192	0.026001
-0.1253299831	0.3718548508	427/16384	0.026062
-0.125303274	0.37184027	53/2032	0.0260827
-0.1253685802	0.3717985438	107/4096	0.026123
-0.1253988535	0.3716790549	429/16384	0.0261841
-0.1254977309	0.3715593853	215/8192	0.0262451
-0.1258401054	0.3713859123	53/2016	0.0262897
-0.1258319313	0.3716294598	431/16384	0.0263062
-0.1256788609	0.3718609346	27/1024	0.0263672
-0.1256788609	0.3718609346	27/1024	0.0263672
-0.1259366785	0.37206568	433/16384	0.0264282
-0.1260313747	0.3719814326	217/8192	0.0264893
-0.126092461	0.3718802887	435/16384	0.0265503
-0.1261212667	0.3718379993	17/640	0.0265625
-0.1262346238	0.3719339178	109/4096	0.0266113
-0.1264053055	0.3718725099	437/16384	0.0266724
-0.1264058406	0.3718210739	41/1536	0.0266927
-0.1263938953	0.3717067262	53/1984	0.0267137
-0.1265878328	0.3718014939	219/8192	0.0267334
-0.1271477172	0.3721380466	439/16384	0.0267944
-0.1266067256	0.3723714954	55/2048	0.0268555
-0.1264447451	0.372630114	5/186	0.0268817
-0.1265537743	0.3727128952	55/2044	0.026908
-0.1265068404	0.372749508	441/16384	0.0269165
-0.1266687688	0.3729018436	11/408	0.0269608
-0.126550213	0.3729034729	221/8192	0.0269775
-0.1266079502	0.3731240953	443/16384	0.0270386
-0.1263629642	0.3733733067	55/2032	0.0270669
-0.1263300275	0.3731430704	111/4096	0.0270996
-0.1261179717	0.3732289448	445/16384	0.0271606
-0.125972142	0.3732523641	223/8192	0.0272217
-0.1257272846	0.373192027	55/2016	0.0272817
-0.1257412275	0.3732179007	447/16384	0.0272827
-0.125788323	0.3729044787	7/256	0.0273438
-0.125788323	0.3729044787	7/256	0.0273438
-0.1249060575	0.3726748871	449/16384	0.0274048
-0.1252425612	0.3736570783	225/8192	0.0274658
-0.1254803366	0.3734569305	451/16384	0.0275269
-0.1256025124	0.373564171	113/4096	0.0275879
-0.1256779138	0.3735795054	53/1920	0.0276042
-0.1256971717	0.3735401657	453/16384	0.0276489
-0.1257557485	0.3735229164	227/8192	0.02771
-0.1257902365	0.3735352192	55/1984	0.0277218
-0.1258573342	0.3735514272	455/16384	0.027771
-0.1258277911	0.3736399424	57/2048	0.027832
-0.1258839963	0.3736950077	19/682	0.0278592
-0.1259020419	0.3736680822	57/2044	0.0278865
-0.1259077701	0.3736742944	457/16384	0.0278931
-0.125930994	0.3736414673	19/680	0.0279412
-0.1259366554	0.3736541898	229/8192	0.0279541
-0.1259485933	0.3736325096	43/1536	0.0279948
-0.1259614569	0.3736199144	459/16384	0.0280151
-0.1260367796	0.3735950396	57/2032	0.0280512
-0.1260187887	0.373655772	115/4096	0.0280762
-0.1261078172	0.3736883904	461/16384	0.0281372
-0.1261644464	0.3737519062	231/8192	0.0281982
-0.1261583076	0.3738745906	463/16384	0.0282593
-0.1261342005	0.3739098389	19/672	0.0282738
-0.1260462834	0.373872415	29/1024	0.0283203
-0.1260462834	0.373872415	29/1024	0.0283203
-0.1260744294	0.3740372089	465/16384	0.0283813
-0.1261333862	0.3740159834	233/8192	0.0284424
-0.1261531914	0.3740072081	51/1792	0.0284598
-0.1261696418	0.3739886767	467/16384	0.0285034
-0.1262108157	0.3740180043	117/4096	0.0285645
-0.1262616952	0.3740054021	469/16384	0.0286255
-0.1262621771	0.3739920708	11/384	0.0286458
-0.1263044774	0.3739824857	235/8192	0.0286865
-0.1263711464	0.3739288086	57/1984	0.0287298
-0.1264610514	0.3739746554	471/16384	0.0287476
-0.1263735511	0.3741448846	59/2048	0.0288086
-0.1263557109	0.3742964296	59/2046	0.0288368
-0.1264317463	0.3743154417	59/2044	0.028865
-0.1264131083	0.3743303839	473/16384	0.0288696
-0.1265491382	0.3743927605	59/2040	0.0289216
-0.1264922123	0.3743988552	237/8192	0.0289307
-0.1266334357	0.3744971927	475/16384	0.0289917
-0.126403844	0.3748352326	59/2032	0.0290354
-0.1264441236	0.3746601191	119/4096	0.0290527
-0.1262563433	0.3748057355	477/16384	0.0291138
-0.1260995777	0.3748260133	239/8192	0.0291748
-0.1259236169	0.3747464016	479/16384	0.0292358
-0.1258513071	0.3746304179	59/2016	0.0292659
-0.125981486	0.3745499121	15/512	0.0292969
-0.125981486	0.3745499121	15/512	0.0292969
-0.1253728277	0.3746295134	481/16384	0.0293579
-0.1256410576	0.3747352657	241/8192	0.0294189
-0.1257306107	0.3747792675	483/16384	0.02948
-0.1257201431	0.3748612634	121/4096	0.029541
-0.1257494609	0.3749041754	53/1792	0.0295759
-0.1257650678	0.3749072481	485/16384	0.0296021
-0.1258033876	0.3749361863	243/8192	0.0296631
-0.1258309695	0.3749678449	19/640	0.0296875
-0.1258391777	0.3750283093	487/16384	0.0297241
-0.1258256175	0.3750676314	59/1984	0.0297379
-0.1257458647	0.3750481562	61/2048	0.0297852
-0.1257105331	0.3751306094	61/2046	0.0298143
-0.1257483679	0.3751423624	61/2044	0.0298434
-0.1257413838	0.3751441231	489/16384	0.0298462
-0.1257930647	0.3751701174	61/2040	0.029902
-0.1257801039	0.3751690937	245/8192	0.0299072
-0.1258367443	0.3751787241	491/16384	0.0299683
-0.1258529373	0.3753425622	61/2032	0.0300197
-0.1258276913	0.3752791104	123/4096	0.0300293
-0.1258255101	0.3754384905	493/16384	0.0300903
-0.1257394715	0.3755749189	247/8192	0.0301514
-0.1254908687	0.3755888211	495/16384	0.0302124
-0.1254015795	0.3753959033	61/2016	0.0302579
-0.1254994563	0.3753902458	31/1024	0.0302734
-0.1254994563	0.3753902458	31/1024	0.0302734
-0.1252398273	0.375378165	497/16384	0.0303345
-0.125240294	0.3754890563	249/8192	0.0303955
-0.1252674889	0.3755677266	499/16384	0.0304565
-0.1251894225	0.3756232098	125/4096	0.0305176
-0.1251703952	0.3757189211	501/16384	0.0305786
-0.125192809	0.3757321631	47/1536	0.030599
-0.1251670716	0.3758167128	251/8192	0.0306396
-0.1249907007	0.3760175486	503/16384	0.0307007
-0.1247498968	0.3758990988	59/1920	0.0307292
-0.1247669715	0.3757924222	61/1984	0.030746
-0.1248757919	0.3757734235	63/2048	0.0307617
-0.124688622	0.3756525729	21/682	0.0307918
-0.1246278451	0.3757285692	9/292	0.0308219
-0.1246392562	0.3757248145	505/16384	0.0308228
-0.1245061959	0.375790666	21/680	0.0308824
-0.1245286812	0.3757981091	253/8192	0.0308838
-0.1244002297	0.375936098	507/16384	0.0309448
-0.1242232824	0.375661352	63/2032	0.0310039
-0.1242053023	0.3757223554	127/4096	0.0310059
-0.1239513429	0.3755154428	509/16384	0.0310669
-0.1238000184	0.3752487798	255/8192	0.0311279
-0.1238856653	0.3747064831	511/16384	0.031189
-0.1244264301	0.3749220887	1/32	0.03125
-0.1244264301	0.3749220887	1/32	0.03125
-0.125438986	0.3742235075	513/16384	0.031311
-0.1245651422	0.3732147315	257/8192	0.0313721
-0.1238413431	0.3735705245	515/16384	0.0314331
-0.1227760798	0.3735354939	129/4096	0.0314941
-0.1226461084	0.3741960306	517/16384	0.0315552
-0.1227049085	0.3746203441	259/8192	0.0316162
-0.1226789362	0.3752519688	519/16384	0.0316772
-0.1220707014	0.3754248475	65/2048	0.0317383
-0.1218005803	0.3761508121	63/1984	0.031754
-0.1220818031	0.3761187207	65/2046	0.0317693
-0.1221343368	0.3760037856	61/1920	0.0317708
-0.1222965121	0.3759709859	521/16384	0.0317993
-0.122292189	0.3760461508	65/2044	0.0318004
-0.122359165	0.3759506296	57/1792	0.031808
-0.1225395898	0.3759836443	261/8192	0.0318604
-0.1225065465	0.3760675805	13/408	0.0318627
-0.1226655432	0.3759240239	49/1536	0.031901
-0.1227662186	0.3759073351	523/16384	0.0319214
-0.1229368738	0.3762003815	131/4096	0.0319824
-0.122777347	0.3763182212	65/2032	0.0319882
-0.123236137	0.3764186934	525/16384	0.0320435
-0.1234372558	0.3766500318	263/8192	0.0321045
-0.1235374619	0.3770530538	527/16384	0.0321655
-0.123125525	0.3772658263	33/1024	0.0322266
-0.123125525	0.3772658263	33/1024	0.0322266
-0.1223796149	0.3770609921	65/2016	0.0322421
-0.1236551471	0.3779008809	529/16384	0.0322876
-0.1238203368	0.3775419165	265/8192	0.0323486
-0.1238268987	0.3773467824	531/16384	0.0324097
-0.1239970356	0.3772839262	133/4096	0.0324707
-0.124048184	0.3771443562	533/16384	0.0325317
-0.1240646553	0.3770178631	267/8192	0.0325928
-0.1242438108	0.376786425	535/16384	0.0326538
-0.1244212809	0.377028433	67/2048	0.0327148
-0.1246793029	0.3770820449	67/2046	0.0327468
-0.12464173	0.3770242912	65/1984	0.0327621
-0.1246824851	0.3770007334	537/16384	0.0327759
-0.1247073059	0.3769833979	67/2044	0.0327789
-0.1246770048	0.3768961505	21/640	0.0328125
-0.1247550061	0.3768935452	269/8192	0.0328369
-0.1248032345	0.3768889589	67/2040	0.0328431
-0.1248251933	0.3767480769	539/16384	0.0328979
-0.1250081782	0.3768520292	135/4096	0.032959
-0.1250694715	0.3769445033	67/2032	0.0329724
-0.1251835791	0.3768980969	541/16384	0.03302
-0.1252955096	0.3769489458	271/8192	0.0330811
-0.1254196846	0.3770635286	543/16384	0.0331421
-0.1253011559	0.3772516416	17/512	0.0332031
-0.1253011559	0.3772516416	17/512	0.0332031
-0.1248918547	0.3776712947	67/2016	0.0332341
-0.1259725794	0.3776090433	545/16384	0.0332642
-0.1257242591	0.3770799171	273/8192	0.0333252
-0.1256136605	0.3770440399	547/16384	0.0333862
-0.125613594	0.3769625837	137/4096	0.0334473
-0.1255707401	0.3769266194	549/16384	0.0335083
-0.1255365121	0.3769055841	275/8192	0.0335693
-0.1255062589	0.3768379662	551/16384	0.0336304
-0.1255693722	0.3768170136	69/2048	0.0336914
-0.1255833241	0.3767537623	23/682	0.0337243
-0.1255638071	0.3767523987	553/16384	0.0337524
-0.1255567235	0.3767493003	69/2044	0.0337573
-0.1255522941	0.3767554576	67/1984	0.0337702
-0.1255349148	0.3767406017	277/8192	0.0338135
-0.1255258998	0.3767314703	23/680	0.0338235
-0.125514018	0.3767423459	13/384	0.0338542
-0.1254983318	0.3767405551	555/16384	0.0338745
-0.12549118	0.3766797269	139/4096	0.0339355
-0.1255032885	0.376633369	69/2032	0.0339567
-0.1254660851	0.3765893917	557/16384	0.0339966
-0.125485779	0.3764862718	279/8192	0.0340576
-0.1256480199	0.3764303633	559/16384	0.0341187
-0.1256717937	0.3765566466	35/1024	0.0341797
-0.1256717937	0.3765566466	35/1024	0.0341797
-0.1258230131	0.3765719466	23/672	0.0342262
-0.1258338496	0.3765339815	561/16384	0.0342407
-0.125817937	0.3764650906	281/8192	0.0343018
-0.1257934063	0.3764200265	563/16384	0.0343628
-0.1258360504	0.376380882	141/4096	0.0344238
-0.1258449296	0.376323081	565/16384	0.0344849
-0.1258310987	0.3763151347	53/1536	0.0345052
-0.1258477615	0.3762635751	283/8192	0.0345459
-0.1259736058	0.3761664753	567/16384	0.0346069
-0.126001875	0.3763011181	71/2048	0.034668
-0.1260808727	0.3763562143	71/2046	0.0347019
-0.12609978	0.3763356293	569/16384	0.034729
-0.126107689	0.3763268228	71/2044	0.0347358
-0.1261407083	0.3762941128	69/1984	0.0347782
-0.1261416155	0.3763139431	285/8192	0.03479
-0.1261619838	0.3763082353	71/2040	0.0348039
-0.1261907919	0.3762812082	571/16384	0.0348511
-0.1262689232	0.3763498085	67/1920	0.0348958
-0.1262299511	0.3763466038	143/4096	0.0349121
-0.1262621273	0.3763892167	71/2032	0.0349409
-0.1262860843	0.3763946822	573/16384	0.0349731
-0.1263247167	0.3764367666	287/8192	0.0350342
-0.1263607442	0.3765334119	575/16384	0.0350952
-0.1262281541	0.3765645133	9/256	0.0351562
-0.1262281541	0.3765645133	9/256	0.0351562
-0.1260233607	0.3768836559	577/16384	0.0352173
-0.1259693975	0.3767941384	71/2016	0.0352183
-0.1265863	0.3769719642	289/8192	0.0352783
-0.1265686422	0.3766141618	579/16384	0.0353394
-0.1265659073	0.3764788878	145/4096	0.0354004
-0.1265115135	0.3764510537	581/16384	0.0354614
-0.1264803054	0.3764374108	291/8192	0.0355225
-0.1264531806	0.3763930023	583/16384	0.0355835
-0.1264889292	0.3763706614	73/2048	0.0356445
-0.1264813766	0.3763338306	73/2046	0.0356794
-0.1264715083	0.3763360825	585/16384	0.0357056
-0.1264671734	0.3763378713	1/28	0.0357143
-0.1264556385	0.3763360922	293/8192	0.0357666
-0.1264481082	0.3763358322	73/2040	0.0357843
-0.1264483618	0.3763362384	71/1984	0.0357863
-0.126445995	0.3763401508	55/1536	0.0358073
-0.126438514	0.376341292	587/16384	0.0358276
-0.1264284566	0.3763160794	147/4096	0.0358887
-0.1264179627	0.3762929259	73/2032	0.0359252
-0.1264111007	0.3762943707	23/640	0.0359375
-0.1264099679	0.3762862065	589/16384	0.0359497
-0.1264055272	0.3762561665	295/8192	0.0360107
-0.1264294872	0.3762211402	591/16384	0.0360718
-0.1264630981	0.3762410128	37/1024	0.0361328
-0.1264630981	0.3762410128	37/1024	0.0361328
-0.1264876885	0.3761816001	593/16384	0.0361938
-0.1264754946	0.3761871542	73/2016	0.0362103
-0.1264608194	0.3761797234	297/8192	0.0362549
-0.1264525294	0.3761794295	65/1792	0.0362723
-0.1264441257	0.3761836318	595/16384	0.0363159
-0.1264343702	0.3761684281	149/4096	0.036377
-0.1264167088	0.3761656825	597/16384	0.036438
-0.1264006082	0.3761679905	299/8192	0.036499
-0.1263552894	0.3761535572	599/16384	0.0365601
-0.126394008	0.3761117127	75/2048	0.0366211
-0.1264101095	0.3760599098	25/682	0.0366569
-0.1263935048	0.3760497321	601/16384	0.0366821
-0.1263847975	0.3760475808	75/2044	0.0366928
-0.1263661876	0.3760242478	301/8192	0.0367432
-0.1263512894	0.3760111061	5/136	0.0367647
-0.1263237314	0.3760251007	73/1984	0.0367944
-0.1263136184	0.3759949861	603/16384	0.0368042
-0.1263784573	0.3759194702	151/4096	0.0368652
-0.1264359161	0.3758617993	75/2032	0.0369094
-0.126468841	0.3758492397	605/16384	0.0369263
-0.1265872258	0.3758452908	71/1920	0.0369792
-0.1265528298	0.3758476203	303/8192	0.0369873
-0.1266317162	0.3759107202	607/16384	0.0370483
-0.1265778537	0.375990473	19/512	0.0371094
-0.1265778537	0.375990473	19/512	0.0371094
-0.1266933509	0.3761794516	609/16384	0.0371704
-0.1267601712	0.3760164663	25/672	0.0372024
-0.1267715668	0.3759721818	305/8192	0.0372314
-0.1267331537	0.375930405	611/16384	0.0372925
-0.1267544165	0.3758906881	153/4096	0.0373535
-0.1267485368	0.3758622343	67/1792	0.0373884
-0.1267409219	0.3758577381	613/16384	0.0374146
-0.126726311	0.375835315	307/8192	0.0374756
-0.1267259436	0.3757782019	615/16384	0.0375366
-0.1267803371	0.3757888007	77/2048	0.0375977
-0.1268190745	0.3757524872	7/186	0.0376344
-0.1268087734	0.375738206	617/16384	0.0376587
-0.1268011052	0.3757352468	11/292	0.0376712
-0.1267934692	0.3757140294	309/8192	0.0377197
-0.1267815674	0.3757046606	77/2040	0.0377451
-0.1267634129	0.3756934083	619/16384	0.0377808
-0.126733764	0.3756853023	75/1984	0.0378024
-0.1267971221	0.3756366389	155/4096	0.0378418
-0.1268198046	0.3755438801	77/2032	0.0378937
-0.1268579283	0.3755387352	621/16384	0.0379028
-0.1269731642	0.3754979538	311/8192	0.0379639
-0.1271101848	0.3756419138	73/1920	0.0380208
-0.1270967963	0.3756185015	623/16384	0.0380249
-0.1270059174	0.3756957223	39/1024	0.0380859
-0.1270059174	0.3756957223	39/1024	0.0380859
-0.1271082933	0.3758061238	625/16384	0.038147
-0.1271363726	0.3757487341	11/288	0.0381944
-0.1271455687	0.3757620553	313/8192	0.038208
-0.1271660675	0.3757249329	627/16384	0.038269
-0.1272108113	0.3757382094	157/4096	0.0383301
-0.1272543344	0.3757203679	629/16384	0.0383911
-0.1272540494	0.3757078929	59/1536	0.0384115
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-0.1273350012	0.375811081	79/2048	0.0385742
-0.1273427581	0.3758894524	79/2046	0.0386119
-0.1273657262	0.3758945584	633/16384	0.0386353
-0.1273794189	0.3758890658	79/2044	0.0386497
-0.1274048523	0.3759073695	317/8192	0.0386963
-0.127433408	0.3759110351	79/2040	0.0387255
-0.1274575655	0.3759147444	635/16384	0.0387573
-0.1274490477	0.376016337	77/1984	0.0388105
-0.1274455387	0.3759882669	159/4096	0.0388184
-0.1274580768	0.3760824761	79/2032	0.038878
-0.1274551561	0.3760757792	637/16384	0.0388794
-0.127448912	0.3761550184	319/8192	0.0389404
-0.1273383777	0.3762801374	639/16384	0.0390015
-0.1272430176	0.3761241389	5/128	0.0390625
-0.1272430176	0.3761241389	5/128	0.0390625
-0.1269184503	0.3760289388	641/16384	0.0391235
-0.1268375671	0.3763938917	321/8192	0.0391846
-0.1268218024	0.3762859843	79/2016	0.0391865
-0.1271076067	0.3766127885	643/16384	0.0392456
-0.1273488712	0.3768876248	161/4096	0.0393066
-0.1277042527	0.3767653527	645/16384	0.0393677
-0.1277334606	0.3764506465	323/8192	0.0394287
-0.1277117672	0.3762428886	647/16384	0.0394897
-0.1278186946	0.3761911768	81/2048	0.0395508
-0.127789663	0.3761089891	27/682	0.0395894
-0.1277707621	0.3761113691	649/16384	0.0396118
-0.1277621067	0.3761156808	71/1792	0.0396205
-0.1277603127	0.3761198309	81/2044	0.0396282
-0.1277397966	0.3761122076	325/8192	0.0396729
-0.1277187326	0.3761155039	27/680	0.0397059
-0.1277203889	0.3761186082	61/1536	0.0397135
-0.1277061506	0.3761188557	651/16384	0.0397339
-0.12769552	0.3760727717	163/4096	0.0397949
-0.1276932606	0.3760392163	79/1984	0.0398185
-0.1276746848	0.3760233179	653/16384	0.039856
-0.1276699483	0.3760164737	81/2032	0.0398622
-0.1276741723	0.3759839697	327/8192	0.039917
-0.1277050157	0.3759438166	655/16384	0.039978
-0.127746589	0.3759661005	41/1024	0.0400391
-0.127746589	0.3759661005	41/1024	0.0400391
-0.1277611579	0.3758895791	657/16384	0.0401001
-0.1277507899	0.3758928126	77/1920	0.0401042
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-0.1277260072	0.3758971348	9/224	0.0401786
-0.1277184484	0.3759024763	659/16384	0.0402222
-0.1277075505	0.3758887861	165/4096	0.0402832
-0.1276906826	0.3758871344	661/16384	0.0403442
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-0.1276703601	0.3757971675	665/16384	0.0405884
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-0.1276531383	0.3757820369	333/8192	0.0406494
-0.1276368008	0.3757731002	83/2040	0.0406863
-0.1276252087	0.3757633196	667/16384	0.0407104
-0.1276580459	0.3757287253	167/4096	0.0407715
-0.1276825728	0.3756889364	81/1984	0.0408266
-0.1276881681	0.3756927721	669/16384	0.0408325
-0.1276877142	0.3756825982	83/2032	0.0408465
-0.1277156172	0.3756759575	335/8192	0.0408936
-0.1277628284	0.3756729853	671/16384	0.0409546
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-0.1277672784	0.3757285171	21/512	0.0410156
-0.1279449035	0.3758072112	673/16384	0.0410767
-0.1278414674	0.3756200165	337/8192	0.0411377
-0.1278212756	0.3756173586	79/1920	0.0411458
-0.1278161151	0.3756290271	83/2016	0.0411706
-0.1278062777	0.3756318686	675/16384	0.0411987
-0.1277906591	0.3756104961	169/4096	0.0412598
-0.1277710702	0.3756099871	677/16384	0.0413208
-0.1277579611	0.3756122012	339/8192	0.0413818
-0.1277337493	0.3756026692	679/16384	0.0414429
-0.127745469	0.3755806447	85/2048	0.0415039
-0.1277313208	0.3755601377	85/2046	0.0415445
-0.1277241027	0.3755632779	681/16384	0.0415649
-0.1277225377	0.3755679278	85/2044	0.0415851
-0.1277132241	0.3755692142	341/8192	0.041626
-0.1277083857	0.3755762482	1/24	0.0416667
-0.1277041007	0.3755804353	683/16384	0.041687
-0.1276834226	0.3755681575	171/4096	0.041748
-0.1276440355	0.375556463	685/16384	0.0418091
-0.1276342018	0.3755659089	85/2032	0.0418307
-0.1276345872	0.3755726937	83/1984	0.0418347
-0.1276055107	0.3755281462	343/8192	0.0418701
-0.1276154401	0.375430888	687/16384	0.0419312
-0.1276893534	0.3754630119	43/1024	0.0419922
-0.1276893534	0.3754630119	43/1024	0.0419922
-0.127754012	0.3753608665	689/16384	0.0420532
-0.1277047088	0.3753393087	345/8192	0.0421143
-0.1276729677	0.3753443986	85/2016	0.0421627
-0.1276635825	0.3753345163	691/16384	0.0421753
-0.1276476798	0.3753311227	27/640	0.0421875
-0.1276560013	0.3752858317	173/4096	0.0422363
-0.1276115792	0.3752498623	693/16384	0.0422974
-0.1275984445	0.3752588252	65/1536	0.0423177
-0.1275582108	0.3752230204	347/8192	0.0423584
-0.1274827052	0.3750293136	695/16384	0.0424194
-0.1276919117	0.3750798473	87/2048	0.0424805
-0.1278330639	0.3750506751	29/682	0.042522
-0.1278531879	0.3750056359	697/16384	0.0425415
-0.1278349004	0.374976907	87/2044	0.0425636
-0.1278958639	0.3749290157	349/8192	0.0426025
-0.1278989623	0.3748471319	29/680	0.0426471
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-0.128214745	0.3750271213	701/16384	0.0427856
-0.1282977551	0.3750261756	87/2032	0.042815
-0.1282824747	0.3751422862	85/1984	0.0428427
-0.128275341	0.3751111772	351/8192	0.0428467
-0.1282954483	0.3752797667	703/16384	0.0429077
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-0.1281054025	0.3752804876	11/256	0.0429688
-0.1279014234	0.375541127	705/16384	0.0430298
-0.1281881464	0.3757882718	353/8192	0.0430908
-0.1285575302	0.3755440454	707/16384	0.0431519
-0.1285986043	0.3754535667	29/672	0.0431548
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-0.1286207858	0.3752498723	83/1920	0.0432292
-0.1285769376	0.3752519242	709/16384	0.0432739
-0.1285407422	0.3752075246	355/8192	0.043335
-0.1285316472	0.3751112407	711/16384	0.043396
-0.1286151384	0.3751073307	89/2048	0.043457
-0.1286370594	0.3750361092	89/2046	0.0434995
-0.1286192572	0.3750225894	713/16384	0.0435181
-0.1286041431	0.3750299926	89/2044	0.0435421
-0.1285896206	0.3750077674	357/8192	0.0435791
-0.1285666348	0.3750061885	67/1536	0.0436198
-0.1285610622	0.3750113948	89/2040	0.0436275
-0.1285515706	0.3750013152	715/16384	0.0436401
-0.1285565004	0.3749417722	179/4096	0.0437012
-0.1285466147	0.3748539522	717/16384	0.0437622
-0.1284894872	0.3747949598	89/2032	0.0437992
-0.1285696646	0.374777854	359/8192	0.0438232
-0.1286241888	0.3747248416	87/1984	0.0438508
-0.1286812841	0.3747212401	719/16384	0.0438843
-0.1287280054	0.3748267288	45/1024	0.0439453
-0.1287280054	0.3748267288	45/1024	0.0439453
-0.1289021909	0.3747118144	721/16384	0.0440063
-0.1288363787	0.3746677839	361/8192	0.0440674
-0.1288142652	0.374652097	79/1792	0.0440848
-0.1287862236	0.3746482982	723/16384	0.0441284
-0.1287608669	0.3746348543	89/2016	0.0441468
-0.128789741	0.3745907758	181/4096	0.0441895
-0.1287451696	0.3745474143	725/16384	0.0442505
-0.1287318911	0.3745557681	17/384	0.0442708
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-0.1285763565	0.3743895571	727/16384	0.0443726
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-0.1289789727	0.3742270995	91/2046	0.044477
-0.1289967848	0.3741357872	729/16384	0.0444946
-0.1289185021	0.3741086025	13/292	0.0445205
-0.1289977339	0.3739691707	365/8192	0.0445557
-0.1288101483	0.373829442	91/2040	0.0446078
-0.1289473956	0.3736693249	731/16384	0.0446167
-0.1294370507	0.373741158	183/4096	0.0446777
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-0.1302935747	0.3744859975	91/2032	0.0447835
-0.1300633165	0.3743478476	367/8192	0.0447998
-0.1298647368	0.3747566509	89/1984	0.0448589
-0.129903907	0.3747287505	735/16384	0.0448608
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-0.1295525761	0.3746208064	23/512	0.0449219
-0.1291020573	0.3751687149	737/16384	0.0449829
-0.1298667992	0.3752725435	369/8192	0.0450439
-0.1299387778	0.3751042305	739/16384	0.045105
-0.1300662408	0.3750595503	13/288	0.0451389
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-0.1301727689	0.3750922748	81/1792	0.0452009
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-0.1303209616	0.3749661889	29/640	0.0453125
-0.1304414466	0.3749783129	743/16384	0.0453491
-0.1304132731	0.3751656671	93/2048	0.0454102
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-0.1305962149	0.3752664334	745/16384	0.0454712
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-0.1307122788	0.3750695442	31/680	0.0455882
-0.130744491	0.375111761	747/16384	0.0455933
-0.1309213097	0.3752383869	187/4096	0.0456543
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-0.1311922117	0.3760728429	93/2032	0.0457677
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-0.1308480859	0.3761124764	751/16384	0.0458374
-0.1306214183	0.3760335986	91/1984	0.0458669
-0.1306799269	0.3758358826	47/1024	0.0458984
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-0.1303124954	0.3761400127	753/16384	0.0459595
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-0.1305523654	0.3762720722	755/16384	0.0460815
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-0.1302828274	0.3768732009	89/1920	0.0463542
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-0.1295345309	0.3764044427	3/64	0.046875
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-0.1299081378	0.3756033205	769/16384	0.046936
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-0.1282835807	0.3761997893	193/4096	0.0471191
-0.1283464894	0.3759997343	95/2016	0.047123
-0.1281658762	0.3764930048	773/16384	0.0471802
-0.1283035543	0.3768734687	387/8192	0.0472412
-0.1285322483	0.3773267557	775/16384	0.0473022
-0.1281801031	0.377569392	97/2048	0.0473633
-0.1282715036	0.3780723677	91/1920	0.0473958
-0.1283027819	0.3780107647	97/2046	0.0474096
-0.1283942656	0.3779965169	777/16384	0.0474243
-0.1284558306	0.3779627852	85/1792	0.047433
-0.1285085821	0.3779360951	97/2044	0.047456
-0.1286126378	0.3779495116	389/8192	0.0474854
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-0.1287962392	0.3778147211	779/16384	0.0475464
-0.1288324672	0.3778840582	97/2040	0.047549
-0.1290677741	0.3780127765	195/4096	0.0476074
-0.129516184	0.3780282195	781/16384	0.0476685
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-0.1298711981	0.3781522074	97/2032	0.0477362
-0.1301068443	0.3781007604	783/16384	0.0477905
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-0.1311782594	0.3786369722	95/1984	0.0478831
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-0.1303511025	0.3779623901	197/4096	0.0480957
-0.1303614938	0.3779037642	97/2016	0.0481151
-0.130317718	0.3778941281	789/16384	0.0481567
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-0.1302711806	0.3776736271	791/16384	0.0482788
-0.1304276339	0.3777422002	99/2048	0.0483398
-0.1305606167	0.3776941164	3/62	0.0483871
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-0.1305542163	0.3776179308	99/2044	0.0484344
-0.1305465125	0.377614034	31/640	0.0484375
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-0.1306359245	0.377472016	33/680	0.0485294
-0.1307317569	0.3775380488	199/4096	0.048584
-0.130856694	0.3775696607	797/16384	0.048645
-0.1309297925	0.3776059432	399/8192	0.0487061
-0.1309509355	0.3776547088	99/2032	0.0487205
-0.131001326	0.3777048513	799/16384	0.0487671
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-0.1309828235	0.3783046523	801/16384	0.0488892
-0.1311782594	0.3786369722	97/1984	0.0488911
-0.1312663893	0.3777592999	401/8192	0.0489502
-0.1311594479	0.3777304714	803/16384	0.0490112
-0.1311685907	0.3776639796	201/4096	0.0490723
-0.1311492675	0.3776284337	11/224	0.0491071
-0.1311388644	0.3776271383	805/16384	0.0491333
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-0.1310999581	0.3775504592	807/16384	0.0492554
-0.1311532214	0.3775452213	101/2048	0.0493164
-0.1311678068	0.3774935408	101/2046	0.0493646
-0.1311625326	0.377483906	809/16384	0.0493774
-0.1311405504	0.3774861831	101/2044	0.0494129
-0.1311379528	0.3774728654	405/8192	0.0494385
-0.1311193714	0.3774718897	19/384	0.0494792
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-0.1310939968	0.3774639882	101/2040	0.0495098
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-0.1310944906	0.3773333425	813/16384	0.0496216
-0.1311142441	0.3772390165	407/8192	0.0496826
-0.1311834474	0.3771944979	101/2032	0.0497047
-0.1312967071	0.3771958861	815/16384	0.0497437
-0.131286107	0.3773362714	51/1024	0.0498047
-0.131286107	0.3773362714	51/1024	0.0498047
-0.1315239487	0.3773781497	817/16384	0.0498657
-0.1314719186	0.3773109766	99/1984	0.0498992
-0.1314977912	0.3772849227	409/8192	0.0499268
-0.1314762279	0.377221846	819/16384	0.0499878
-0.1315381193	0.3771845692	205/4096	0.0500488
-0.1315595434	0.3771216409	101/2016	0.0500992
-0.1315707556	0.3771084205	821/16384	0.0501099
-0.1315532448	0.3770934624	77/1536	0.0501302
-0.1315856404	0.3770296943	411/8192	0.0501709
-0.1318132274	0.3769153357	823/16384	0.0502319
-0.1317875818	0.3771388287	103/2048	0.050293
-0.1318864183	0.3772599855	103/2046	0.0503421
-0.1319139642	0.3772765164	825/16384	0.050354
-0.1319684312	0.3772268604	103/2044	0.0503914
-0.1319916198	0.3772691547	413/8192	0.050415
-0.1320953696	0.3772593676	827/16384	0.0504761
-0.1321705525	0.3772802212	103/2040	0.0504902
-0.1321398607	0.3774442704	97/1920	0.0505208
-0.1320918916	0.3773914111	207/4096	0.0505371
-0.1321110362	0.3775300187	829/16384	0.0505981
-0.1321125326	0.3776312184	415/8192	0.0506592
-0.1320600393	0.3777342033	103/2032	0.050689
-0.1320060482	0.3777987481	831/16384	0.0507202
-0.1318560979	0.3776379445	13/256	0.0507812
-0.1318560979	0.3776379445	13/256	0.0507812
-0.1314018922	0.3776302006	833/16384	0.0508423
-0.1314320521	0.3782608813	417/8192	0.0509033
-0.1311782594	0.3786369722	101/1984	0.0509073
-0.1318175955	0.3782895965	835/16384	0.0509644
-0.1324816515	0.3780798095	209/4096	0.0510254
-0.1323804889	0.3779438702	837/16384	0.0510864
-0.1323647298	0.3779276777	103/2016	0.0510913
-0.1323368445	0.3778762969	419/8192	0.0511475
-0.1323564826	0.3777577366	839/16384	0.0512085
-0.1324452423	0.3777756467	105/2048	0.0512695
-0.1324747158	0.377700389	35/682	0.0513196
-0.132472541	0.3776857281	841/16384	0.0513306
-0.1324388507	0.3776850692	15/292	0.0513699
-0.1324436339	0.3776679154	421/8192	0.0513916
-0.132421644	0.3776611875	79/1536	0.0514323
-0.132408585	0.3776541667	843/16384	0.0514526
-0.1323830735	0.3776391163	7/136	0.0514706
-0.1324247991	0.3776028118	211/4096	0.0515137
-0.1324312559	0.3775413832	33/640	0.0515625
-0.1324398703	0.3775272866	845/16384	0.0515747
-0.1324701801	0.3774730609	423/8192	0.0516357
-0.1325308804	0.377441261	105/2032	0.0516732
-0.1325634606	0.377449103	847/16384	0.0516968
-0.1325815586	0.3775348204	53/1024	0.0517578
-0.1325815586	0.3775348204	53/1024	0.0517578
-0.1327664811	0.3774410914	849/16384	0.0518188
-0.1326921109	0.3774181631	425/8192	0.0518799
-0.132672504	0.3774044746	93/1792	0.0518973
-0.1326631413	0.3774083709	103/1984	0.0519153
-0.1326503454	0.3774035686	851/16384	0.0519409
-0.1326522556	0.3773614836	213/4096	0.052002
-0.1326220201	0.3773288793	853/16384	0.052063
-0.1326124713	0.3773345292	5/96	0.0520833
-0.1325893015	0.3773140826	427/8192	0.052124
-0.1325223811	0.3772277353	855/16384	0.0521851
-0.1326496724	0.3772032173	107/2048	0.0522461
-0.1327431822	0.3770996446	107/2046	0.0522972
-0.1327632294	0.3770651222	857/16384	0.0523071
-0.1326793939	0.3770179647	107/2044	0.0523483
-0.1327287586	0.3769711248	429/8192	0.0523682
-0.1326408321	0.3768360919	859/16384	0.0524292
-0.1325265065	0.37671041	107/2040	0.052451
-0.132893519	0.3767303201	215/4096	0.0524902
-0.1333060137	0.3767143106	861/16384	0.0525513
-0.1336393249	0.3770114856	101/1920	0.0526042
-0.1335503794	0.3769036722	431/8192	0.0526123
-0.1336595711	0.3772495017	107/2032	0.0526575
-0.1335475328	0.3773086416	863/16384	0.0526733
-0.1332172841	0.3772802163	27/512	0.0527344
-0.1332172841	0.3772802163	27/512	0.0527344
-0.1328303529	0.3777520848	865/16384	0.0527954
-0.1337239754	0.3780150515	433/8192	0.0528564
-0.1337032654	0.3777329998	867/16384	0.0529175
-0.1337565344	0.3776934207	105/1984	0.0529234
-0.1338922315	0.3776975343	217/4096	0.0529785
-0.1339911264	0.3776016988	95/1792	0.0530134
-0.1339834741	0.3775675659	869/16384	0.0530396
-0.1339425074	0.377493605	107/2016	0.0530754
-0.1340172489	0.3774654995	435/8192	0.0531006
-0.1342277589	0.3773236657	871/16384	0.0531616
-0.134297007	0.3775547816	109/2048	0.0532227
-0.1345388375	0.3775919629	109/2046	0.0532747
-0.1346072973	0.3775965919	873/16384	0.0532837
-0.1345674299	0.3774333177	109/2044	0.0533268
-0.1346600105	0.3774641993	437/8192	0.0533447
-0.134673297	0.3772837921	875/16384	0.0534058
-0.1345604767	0.3770275367	109/2040	0.0534314
-0.1349900743	0.3772891577	219/4096	0.0534668
-0.1356646501	0.3774398307	877/16384	0.0535278
-0.1361281491	0.3779920318	439/8192	0.0535889
-0.1353452125	0.3791264607	109/2032	0.0536417
-0.1353023252	0.3789271087	103/1920	0.0536458
-0.1354505129	0.3788736389	879/16384	0.0536499
-0.1350491949	0.3783628937	55/1024	0.0537109
-0.1350491949	0.3783628937	55/1024	0.0537109
-0.1343051331	0.3790269034	881/16384	0.053772
-0.1346083932	0.3791073307	441/8192	0.053833
-0.1348078155	0.3792111783	883/16384	0.053894
-0.134862319	0.3794736285	107/1984	0.0539315
-0.1347274649	0.3794235745	221/4096	0.0539551
-0.1347552393	0.379668384	885/16384	0.0540161
-0.1348214013	0.3796841651	83/1536	0.0540365
-0.1350395317	0.3800616853	109/2016	0.0540675
-0.1348183671	0.3798797578	443/8192	0.0540771
-0.1344205628	0.3802873636	887/16384	0.0541382
-0.1342786917	0.3798761117	111/2048	0.0541992
-0.1339392433	0.3798120928	37/682	0.0542522
-0.1338903341	0.3797903838	889/16384	0.0542603
-0.1338354956	0.3799792652	111/2044	0.0543053
-0.1337950708	0.3799190699	445/8192	0.0543213
-0.1336817517	0.3800763794	891/16384	0.0543823
-0.1334166786	0.3800974802	37/680	0.0544118
-0.1334879445	0.3799235564	223/4096	0.0544434
-0.1332322654	0.3797774941	893/16384	0.0545044
-0.1330395507	0.379639372	447/8192	0.0545654
-0.1329770823	0.3792123486	111/2032	0.054626
-0.1329440985	0.3791855233	895/16384	0.0546265
-0.1334072786	0.3792092817	7/128	0.0546875
-0.1334072786	0.3792092817	7/128	0.0546875
-0.1340477562	0.3782802742	897/16384	0.0547485
-0.1328961841	0.3780465394	449/8192	0.0548096
-0.1326930981	0.3783655563	899/16384	0.0548706
-0.1318136465	0.3787572261	225/4096	0.0549316
-0.1311782594	0.3786369722	109/1984	0.0549395
-0.1319043397	0.3791488328	901/16384	0.0549927
-0.1320335699	0.3794001482	451/8192	0.0550537
-0.1317910121	0.3793693094	37/672	0.0550595
-0.1321834412	0.3800323429	903/16384	0.0551147
-0.1321450126	0.3807280386	113/2048	0.0551758
-0.1325214604	0.3806425385	113/2046	0.0552297
-0.1325497002	0.3806394442	905/16384	0.0552368
-0.1325438305	0.3805943298	99/1792	0.0552455
-0.1325492147	0.3804991962	113/2044	0.0552838
-0.1325802663	0.380516935	453/8192	0.0552979
-0.1325940215	0.3804367047	85/1536	0.0553385
-0.1326151366	0.3803883004	907/16384	0.0553589
-0.1327711911	0.3803275082	113/2040	0.0553922
-0.1327759299	0.3804328147	227/4096	0.0554199
-0.1329582631	0.3804759127	909/16384	0.055481
-0.1330696924	0.380539387	455/8192	0.055542
-0.1331137357	0.3807012938	911/16384	0.055603
-0.1330878882	0.3807352397	113/2032	0.0556102
-0.1329806582	0.3807516677	57/1024	0.0556641
-0.1329806582	0.3807516677	57/1024	0.0556641
-0.1332004743	0.3810198558	913/16384	0.0557251
-0.1331783399	0.3809478346	107/1920	0.0557292
-0.1331835296	0.3808864754	457/8192	0.0557861
-0.1331934524	0.3808229374	915/16384	0.0558472
-0.1332504921	0.3808168584	229/4096	0.0559082
-0.133288807	0.3807910545	111/1984	0.0559476
-0.1332907142	0.3807761305	917/16384	0.0559692
-0.1333084355	0.3807320776	459/8192	0.0560303
-0.1333458364	0.3807068773	113/2016	0.0560516
-0.1334276504	0.3806600983	919/16384	0.0560913
-0.1334356268	0.3808050798	115/2048	0.0561523
-0.1335355944	0.3809085047	115/2046	0.0562072
-0.1335405508	0.380927822	921/16384	0.0562134
-0.1336302217	0.380878389	115/2044	0.0562622
-0.133621125	0.3809106957	461/8192	0.0562744
-0.1337351825	0.3808830039	923/16384	0.0563354
-0.1338667132	0.3810757941	23/408	0.0563725
-0.1337423891	0.3810435048	231/4096	0.0563965
-0.1337251444	0.3812068506	925/16384	0.0564575
-0.1336893655	0.3813068347	463/8192	0.0565186
-0.1335550033	0.3813913958	927/16384	0.0565796
-0.1334810107	0.3813856211	115/2032	0.0565945
-0.1334788225	0.3812516692	29/512	0.0566406
-0.1334788225	0.3812516692	29/512	0.0566406
-0.1329586461	0.3811730927	929/16384	0.0567017
-0.1333987565	0.3818487436	465/8192	0.0567627
-0.1334816572	0.3817145237	109/1920	0.0567708
-0.1334636127	0.3816069977	931/16384	0.0568237
-0.1335736814	0.3816402868	233/4096	0.0568848
-0.1336399851	0.3816015096	933/16384	0.0569458
-0.1336424071	0.3815895216	113/1984	0.0569556
-0.1336708683	0.3815651964	467/8192	0.0570068
-0.1337260651	0.3815406231	115/2016	0.0570437
-0.1337616616	0.3815478767	935/16384	0.0570679
-0.1337635862	0.3816288857	117/2048	0.0571289
-0.1338532605	0.3816536506	39/682	0.0571848
-0.1338633313	0.3816622184	937/16384	0.0571899
-0.1338739232	0.381602634	117/2044	0.0572407
-0.1338825603	0.3816167033	469/8192	0.057251
-0.1338885219	0.3815651431	939/16384	0.057312
-0.1339702831	0.3814787091	39/680	0.0573529
-0.1339689633	0.3815606562	235/4096	0.057373
-0.1341205038	0.3815422819	941/16384	0.0574341
-0.1343042927	0.3815612223	471/8192	0.0574951
-0.1343676375	0.381955911	943/16384	0.0575562
-0.1342194105	0.3820816885	117/2032	0.0575787
-0.1341049636	0.3818810385	59/1024	0.0576172
-0.1341049636	0.3818810385	59/1024	0.0576172
-0.1337801834	0.3823597182	945/16384	0.0576782
-0.134045277	0.3823110257	473/8192	0.0577393
-0.1341985585	0.3823109488	947/16384	0.0578003
-0.1342546283	0.382327637	37/640	0.0578125
-0.1342343797	0.3824656063	237/4096	0.0578613
-0.1343577637	0.3826056638	949/16384	0.0579224
-0.1344078058	0.3825822347	89/1536	0.0579427
-0.1345024101	0.382517199	115/1984	0.0579637
-0.1345207217	0.3827025589	475/8192	0.0579834
-0.134510097	0.3832976569	951/16384	0.0580444
-0.1341088713	0.3830092254	119/2048	0.0581055
-0.1337267001	0.3830633048	119/2046	0.0581623
-0.1337049394	0.3830259944	953/16384	0.0581665
-0.1336007355	0.3832511789	17/292	0.0582192
-0.1336165781	0.3831881265	477/8192	0.0582275
-0.1334773962	0.3833824554	955/16384	0.0582886
-0.1331527049	0.3831588368	7/120	0.0583333
-0.1332795752	0.3831796018	239/4096	0.0583496
-0.1330961447	0.382999476	957/16384	0.0584106
-0.1329790798	0.3828690903	479/8192	0.0584717
-0.132959067	0.3825729969	959/16384	0.0585327
-0.1331331683	0.382420629	119/2032	0.058563
-0.1332522179	0.3825988441	15/256	0.0585938
-0.1332522179	0.3825988441	15/256	0.0585938
-0.1336997919	0.3819943463	961/16384	0.0586548
-0.1329956801	0.3815937576	481/8192	0.0587158
-0.1327863295	0.3820309158	963/16384	0.0587769
-0.1319233655	0.3824981628	241/4096	0.0588379
-0.1322231402	0.3827452863	113/1920	0.0588542
-0.1323355147	0.3826349754	965/16384	0.0588989
-0.1324722606	0.3827136397	483/8192	0.05896
-0.1324656845	0.3827987902	117/1984	0.0589718
-0.1325374873	0.3829115622	967/16384	0.059021
-0.1325017329	0.3829419765	17/288	0.0590278
-0.1323962427	0.3829597492	121/2048	0.059082
-0.1324230773	0.3831080318	11/186	0.0591398
-0.1324156458	0.3831159135	969/16384	0.0591431
-0.1324942256	0.3831121048	121/2044	0.0591977
-0.1324819133	0.383116501	485/8192	0.0592041
-0.1325211943	0.3831084749	91/1536	0.0592448
-0.1325474063	0.3831057099	971/16384	0.0592651
-0.1326084555	0.3832244465	121/2040	0.0593137
-0.1325719646	0.3831954785	243/4096	0.0593262
-0.1326051121	0.3833204104	973/16384	0.0593872
-0.1326043169	0.3834319636	487/8192	0.0594482
-0.132472263	0.3835271465	975/16384	0.0595093
-0.1323496945	0.383476264	121/2032	0.0595472
-0.1324001014	0.3834178854	61/1024	0.0595703
-0.1324001014	0.3834178854	61/1024	0.0595703
-0.1320464057	0.3836664901	977/16384	0.0596313
-0.1322762398	0.3836283924	489/8192	0.0596924
-0.1323158523	0.3836488431	107/1792	0.0597098
-0.1323566263	0.3836370733	979/16384	0.0597534
-0.1323749568	0.3837073561	245/4096	0.0598145
-0.1324358357	0.3837502136	981/16384	0.0598755
-0.1324503787	0.3837364933	23/384	0.0598958
-0.1325016747	0.3837574155	491/8192	0.0599365
-0.1326090566	0.3837748651	119/1984	0.0599798
-0.1326615086	0.3838862746	983/16384	0.0599976
-0.1326914509	0.3841321414	121/2016	0.0600198
-0.1324471413	0.3839698146	123/2048	0.0600586
-0.1322761072	0.3841723082	41/682	0.0601173
-0.1322591105	0.3841518186	985/16384	0.0601196
-0.1323033146	0.3843587007	123/2044	0.0601761
-0.132300025	0.3843104962	493/8192	0.0601807
-0.132374025	0.3845415512	987/16384	0.0602417
-0.1318861375	0.3845478886	41/680	0.0602941
-0.1320272674	0.3845751997	247/4096	0.0603027
-0.1316765256	0.3844896315	989/16384	0.0603638
-0.131478888	0.3843386051	495/8192	0.0604248
-0.1314504235	0.38403355	991/16384	0.0604858
-0.1317172479	0.3838711535	123/2032	0.0605315
-0.1317082517	0.3840046895	31/512	0.0605469
-0.1317082517	0.3840046895	31/512	0.0605469
-0.1320715973	0.3834058453	993/16384	0.0606079
-0.1310917863	0.3832245317	497/8192	0.0606689
-0.1312703599	0.3837134959	995/16384	0.06073
-0.1310998873	0.3837971176	249/4096	0.060791
-0.131042655	0.3838976129	109/1792	0.0608259
-0.1310630169	0.3839246923	997/16384	0.0608521
-0.1310716553	0.3840165884	499/8192	0.0609131
-0.1310422677	0.3840861927	39/640	0.0609375
-0.1309685753	0.3841670536	999/16384	0.0609741
-0.1308957554	0.3841758601	121/1984	0.0609879
-0.1308144976	0.3841214743	41/672	0.0610119
-0.1308576756	0.3840542165	125/2048	0.0610352
-0.1306788591	0.3841177272	125/2046	0.0610948
-0.1306807001	0.3841054763	1001/16384	0.0610962
-0.1306835265	0.3842210992	125/2044	0.0611546
-0.1306918116	0.384206548	501/8192	0.0611572
-0.1307396316	0.3843052295	1003/16384	0.0612183
-0.1305177517	0.3844020308	25/408	0.0612745
-0.1305891074	0.3844063288	251/4096	0.0612793
-0.1303110962	0.3845339353	1005/16384	0.0613403
-0.1299792971	0.384532755	503/8192	0.0614014
-0.1298012179	0.3840611848	1007/16384	0.0614624
-0.1302035892	0.3839302453	125/2032	0.0615157
-0.1301286229	0.3840028573	63/1024	0.0615234
-0.1301286229	0.3840028573	63/1024	0.0615234
-0.1303158454	0.3832232228	1009/16384	0.0615845
-0.1299188724	0.3835442587	505/8192	0.0616455
-0.1297711984	0.383639695	1011/16384	0.0617065
-0.1296351935	0.3835266427	253/4096	0.0617676
-0.1294547562	0.383504752	1013/16384	0.0618286
-0.1294333672	0.3835520101	95/1536	0.061849
-0.129272793	0.3835415677	507/8192	0.0618896
-0.1288789578	0.3832152129	1015/16384	0.0619507
-0.1291381174	0.3828234524	119/1920	0.0619792
-0.1293055747	0.3828823541	123/1984	0.061996
-0.1293768155	0.3829624088	125/2016	0.062004
-0.1292954536	0.383039423	127/2048	0.0620117
-0.129483399	0.3826714059	127/2046	0.0620723
-0.1294712447	0.3826780693	1017/16384	0.0620728
-0.1293699491	0.382495374	127/2044	0.0621331
-0.1293487888	0.3824902831	509/8192	0.0621338
-0.1291657792	0.3822624477	1019/16384	0.0621948
-0.1294886293	0.3820974145	127/2040	0.0622549
-0.1295068758	0.3820434554	255/4096	0.0622559
-0.1298916522	0.3818310294	1021/16384	0.0623169
-0.1302437272	0.381751258	511/8192	0.0623779
-0.1307042885	0.3820889123	1023/16384	0.062439
-0.1303606698	0.3824316267	1/16	0.0625
-0.1303606698	0.3824316267	1/16	0.0625
-0.1303538069	0.383499718	1025/16384	0.062561
-0.1315057471	0.3833000225	513/8192	0.0626221
-0.1313700278	0.382579435	1027/16384	0.0626831
-0.132304287	0.3818829619	257/4096	0.0627441
-0.1317908941	0.3815455491	1029/16384	0.0628052
-0.1315007897	0.3813433963	515/8192	0.0628662
-0.1310701583	0.3806588134	1031/16384	0.0629272
-0.131174873	0.3797031249	129/2048	0.0629883
-0.1317910121	0.3793693094	127/2016	0.062996
-0.1311782594	0.3786369722	125/1984	0.063004
-0.1305111357	0.3794414019	121/1920	0.0630208
-0.1305014132	0.3796107983	1033/16384	0.0630493
-0.1305564959	0.3795804316	43/682	0.0630499
-0.1304763083	0.3797017644	113/1792	0.063058
-0.1303416478	0.379854195	517/8192	0.0631104
-0.1304147411	0.3798427568	129/2044	0.0631115
-0.1302921102	0.3800411916	97/1536	0.063151
-0.1302428133	0.3801608456	1035/16384	0.0631714
-0.1297686627	0.3801077153	259/4096	0.0632324
-0.1299623079	0.3801524511	43/680	0.0632353
-0.1291301097	0.3803050681	1037/16384	0.0632935
-0.1286559716	0.3804885985	519/8192	0.0633545
-0.1279920324	0.3803984202	1039/16384	0.0634155
-0.1279226036	0.3797518367	65/1024	0.0634766
-0.1279226036	0.3797518367	65/1024	0.0634766
-0.1284871169	0.3798500126	129/2032	0.0634843
-0.126703731	0.379986356	1041/16384	0.0635376
-0.1271368056	0.3804757317	521/8192	0.0635986
-0.1274066521	0.3806101514	1043/16384	0.0636597
-0.1273875287	0.3808813179	261/4096	0.0637207
-0.1275439825	0.3810601783	1045/16384	0.0637817
-0.1277216742	0.381155811	523/8192	0.0638428
-0.1279560031	0.3815802171	1047/16384	0.0639038
-0.1274717555	0.3816723119	131/2048	0.0639648
-0.1270590525	0.3816721477	43/672	0.0639881
-0.1272213445	0.381996007	127/1984	0.0640121
-0.1272279644	0.3820979922	1049/16384	0.0640259
-0.1271649598	0.3821062811	131/2046	0.0640274
-0.1274288922	0.3821910273	41/640	0.0640625
-0.1273747112	0.3823294928	525/8192	0.0640869
-0.1272999988	0.3823081775	131/2044	0.06409
-0.127592883	0.3825746972	1051/16384	0.0641479
-0.1272583999	0.3828540942	263/4096	0.064209
-0.1271994691	0.3826828392	131/2040	0.0642157
-0.1269674709	0.3831487218	1053/16384	0.06427
-0.1267282076	0.3833543782	527/8192	0.0643311
-0.1262742628	0.3834468791	1055/16384	0.0643921
-0.1261411119	0.3829355492	33/512	0.0644531
-0.1261411119	0.3829355492	33/512	0.0644531
-0.1265182649	0.3826473533	131/2032	0.0644685
-0.124761068	0.3825499997	1057/16384	0.0645142
-0.1252069715	0.3840060966	529/8192	0.0645752
-0.1258451932	0.3839529133	1059/16384	0.0646362
-0.1261329738	0.3841879576	265/4096	0.0646973
-0.1263572791	0.3841242381	1061/16384	0.0647583
-0.1264849591	0.3840309041	531/8192	0.0648193
-0.126742036	0.3840317342	1063/16384	0.0648804
-0.1267335126	0.3842432896	133/2048	0.0649414
-0.1268736653	0.3843877375	131/2016	0.0649802
-0.126936341	0.3843305503	1065/16384	0.0650024
-0.126968585	0.384346629	133/2046	0.0650049
-0.1269431173	0.3842807382	129/1984	0.0650202
-0.127007213	0.3842306991	533/8192	0.0650635
-0.127033463	0.3842602344	19/292	0.0650685
-0.1270234941	0.384162481	25/384	0.0651042
-0.1270375687	0.3841134148	1067/16384	0.0651245
-0.1272224701	0.3841246556	267/4096	0.0651855
-0.127209	0.38422744	133/2040	0.0651961
-0.1274889992	0.3841272211	1069/16384	0.0652466
-0.1277771545	0.3842052125	535/8192	0.0653076
-0.1278815989	0.384686369	1071/16384	0.0653687
-0.1275286365	0.3847021108	67/1024	0.0654297
-0.1275286365	0.3847021108	67/1024	0.0654297
-0.1272855596	0.3846273511	133/2032	0.0654528
-0.1272733632	0.3851552597	1073/16384	0.0654907
-0.1276861172	0.3852345838	537/8192	0.0655518
-0.1278719982	0.3851417284	1075/16384	0.0656128
-0.1280238475	0.385276652	269/4096	0.0656738
-0.1282195753	0.3853029112	1077/16384	0.0657349
-0.1282435552	0.3852519545	101/1536	0.0657552
-0.1284169613	0.3852593905	539/8192	0.0657959
-0.1288215165	0.3855859636	1079/16384	0.0658569
-0.128427835	0.3857792794	135/2048	0.065918
-0.1283226855	0.3860913025	19/288	0.0659722
-0.1282913154	0.3861306082	1081/16384	0.065979
-0.1282875893	0.3861939697	45/682	0.0659824
-0.1285162167	0.3862661982	131/1984	0.0660282
-0.1284468273	0.3862889413	541/8192	0.06604
-0.1284020381	0.3863584513	135/2044	0.066047
-0.1286423619	0.3864426415	1083/16384	0.0661011
-0.1284577435	0.386847642	127/1920	0.0661458
-0.128444851	0.3866952854	271/4096	0.0661621
-0.1282522329	0.3866554921	9/136	0.0661765
-0.1282537066	0.3869666934	1085/16384	0.0662231
-0.1280742413	0.3872069274	543/8192	0.0662842
-0.1275573197	0.3872954427	1087/16384	0.0663452
-0.1275636565	0.3867958113	17/256	0.0664062
-0.1275636565	0.3867958113	17/256	0.0664062
-0.1277386953	0.3863717817	135/2032	0.066437
-0.1271788919	0.3860856787	1089/16384	0.0664673
-0.1262244109	0.386688649	545/8192	0.0665283
-0.1265795652	0.3875745919	1091/16384	0.0665894
-0.1266277637	0.3885754619	273/4096	0.0666504
-0.1275652445	0.3887172342	1093/16384	0.0667114
-0.127923034	0.3883169031	547/8192	0.0667725
-0.1284336379	0.3880330722	1095/16384	0.0668335
-0.1287494439	0.3883125499	137/2048	0.0668945
-0.1290611137	0.3880223063	1097/16384	0.0669556
-0.1290468364	0.3879476009	137/2046	0.0669599
-0.1290102967	0.3879753243	15/224	0.0669643
-0.1289374696	0.3878796481	549/8192	0.0670166
-0.1289670282	0.3878127915	137/2044	0.0670254
-0.1289111233	0.3878186643	133/1984	0.0670363
-0.1288648732	0.387820624	103/1536	0.0670573
-0.1288180834	0.3877772766	1099/16384	0.0670776
-0.1289257742	0.3876094903	275/4096	0.0671387
-0.1290722551	0.3876014234	137/2040	0.0671569
-0.1290087935	0.3874590931	43/640	0.0671875
-0.1290439939	0.3874235624	1101/16384	0.0671997
-0.1291649122	0.3872898902	551/8192	0.0672607
-0.1293937178	0.3872920832	1103/16384	0.0673218
-0.1294082768	0.3874764999	69/1024	0.0673828
-0.1294082768	0.3874764999	69/1024	0.0673828
-0.1295297441	0.3877565283	137/2032	0.0674213
-0.1297499063	0.3876417097	1105/16384	0.0674438
-0.1297009006	0.387302832	553/8192	0.0675049
-0.1296660109	0.3872472188	121/1792	0.0675223
-0.1296015034	0.3872370732	1107/16384	0.0675659
-0.1296170335	0.3871388893	277/4096	0.067627
-0.1295717886	0.3870601532	1109/16384	0.067688
-0.1295007717	0.3870171447	555/8192	0.067749
-0.1294155719	0.3868143541	1111/16384	0.0678101
-0.1296426197	0.386819935	139/2048	0.0678711
-0.1298581843	0.3867068861	1113/16384	0.0679321
-0.1298764908	0.3866665608	139/2046	0.0679374
-0.1297995931	0.3866563916	137/2016	0.0679563
-0.1298471255	0.3865418897	557/8192	0.0679932
-0.129899984	0.3865061837	139/2044	0.0680039
-0.1297494148	0.3864232923	135/1984	0.0680444
-0.1297976486	0.3863292129	1115/16384	0.0680542
-0.1301193668	0.3862968757	279/4096	0.0681152
-0.130234837	0.3864311951	139/2040	0.0681373
-0.1304582455	0.3863749382	1117/16384	0.0681763
-0.1307356822	0.3865805856	131/1920	0.0682292
-0.1306693934	0.3865195148	559/8192	0.0682373
-0.1307123429	0.3868330697	1119/16384	0.0682983
-0.130449916	0.3868727295	35/512	0.0683594
-0.130449916	0.3868727295	35/512	0.0683594
-0.1301841081	0.3870133804	139/2032	0.0684055
-0.1301467534	0.3872012183	1121/16384	0.0684204
-0.1306459768	0.3875186835	561/8192	0.0684814
-0.130910624	0.3871879478	1123/16384	0.0685425
-0.131122347	0.3870684692	281/4096	0.0686035
-0.1311753045	0.3869403823	123/1792	0.0686384
-0.1311443701	0.386914267	1125/16384	0.0686646
-0.1311159281	0.3868148335	563/8192	0.0687256
-0.1311994131	0.3866443013	1127/16384	0.0687866
-0.1313255112	0.3867359949	141/2048	0.0688477
-0.131491084	0.3866640277	1129/16384	0.0689087
-0.1314869555	0.3866341071	47/682	0.068915
-0.1314253684	0.386596908	139/2016	0.0689484
-0.1314602446	0.3865669325	565/8192	0.0689697
-0.1314704399	0.3865312896	141/2044	0.0689824
-0.1314005455	0.386481535	1131/16384	0.0690308
-0.1313413337	0.3864251435	137/1984	0.0690524
-0.1315235127	0.3863694683	283/4096	0.0690918
-0.1316597328	0.3863523308	47/680	0.0691176
-0.131757908	0.3862392642	1133/16384	0.0691528
-0.1320265596	0.3862205054	567/8192	0.0692139
-0.1321884326	0.3866110286	133/1920	0.0692708
-0.1321847649	0.3865599427	1135/16384	0.0692749
-0.1319580525	0.3866343601	71/1024	0.0693359
-0.1319580525	0.3866343601	71/1024	0.0693359
-0.1318654361	0.3869044293	141/2032	0.0693898
-0.1318323938	0.3869830992	1137/16384	0.069397
-0.1321800375	0.386945794	569/8192	0.069458
-0.1322605106	0.386841208	1139/16384	0.069519
-0.132369167	0.3868803502	285/4096	0.0695801
-0.132478679	0.3868599804	1141/16384	0.0696411
-0.1324819485	0.3868290478	107/1536	0.0696615
-0.1325655655	0.3868052846	571/8192	0.0697021
-0.1327974768	0.3868944675	1143/16384	0.0697632
-0.132655248	0.3870428254	143/2048	0.0698242
-0.1326528535	0.3872576339	1145/16384	0.0698853
-0.1326944163	0.387266959	13/186	0.0698925
-0.1327948708	0.3872908954	47/672	0.0699405
-0.1327711291	0.3872878655	573/8192	0.0699463
-0.1328133725	0.387328781	143/2044	0.0699609
-0.1329037752	0.3873057644	1147/16384	0.0700073
-0.132868903	0.387538054	139/1984	0.0700605
-0.1328820574	0.3874830945	287/4096	0.0700684
-0.1327887762	0.3876276801	143/2040	0.070098
-0.1328443101	0.3877020624	1149/16384	0.0701294
-0.1327920668	0.3879043889	575/8192	0.0701904
-0.1324295081	0.3880361196	1151/16384	0.0702515
-0.1324089408	0.3877148801	9/128	0.0703125
-0.1324089408	0.3877148801	9/128	0.0703125
-0.1321988631	0.3873113569	1153/16384	0.0703735
-0.132200981	0.3873531173	143/2032	0.070374
-0.1316724106	0.3875885678	577/8192	0.0704346
-0.1317422876	0.3881476924	1155/16384	0.0704956
-0.1315539449	0.3887767	289/4096	0.0705566
-0.1322380324	0.3892950966	1157/16384	0.0706177
-0.132722422	0.3889586669	579/8192	0.0706787
-0.1333304017	0.3886064193	1159/16384	0.0707397
-0.1338056136	0.3889853186	145/2048	0.0708008
-0.134541808	0.3883910449	1161/16384	0.0708618
-0.1343131917	0.3882125923	145/2046	0.07087
-0.1343515037	0.3882319448	127/1792	0.0708705
-0.1340283296	0.3880763017	581/8192	0.0709229
-0.1339309909	0.387910371	143/2016	0.0709325
-0.1338551032	0.387992227	145/2044	0.0709393
-0.1338236741	0.3880805585	109/1536	0.0709635
-0.1337215104	0.3880754	1163/16384	0.0709839
-0.1336551074	0.3878072592	291/4096	0.0710449
-0.1336850936	0.3876262154	141/1984	0.0710685
-0.1336163232	0.387592146	29/408	0.0710784
-0.133553582	0.387584512	1165/16384	0.071106
-0.1335018309	0.3874493361	583/8192	0.071167
-0.1335654998	0.3872991446	1167/16384	0.071228
-0.1336928517	0.3873238844	73/1024	0.0712891
-0.1336928517	0.3873238844	73/1024	0.0712891
-0.1338413969	0.3870743359	1169/16384	0.0713501
-0.1340007622	0.3868881043	137/1920	0.0713542
-0.1337018317	0.3869288398	145/2032	0.0713583
-0.1336041443	0.3871164419	585/8192	0.0714111
-0.1335649818	0.3871680226	1171/16384	0.0714722
-0.1335170486	0.3871496436	293/4096	0.0715332
-0.133470845	0.3871598253	1173/16384	0.0715942
-0.1334392283	0.3871855628	587/8192	0.0716553
-0.1333295951	0.3871766103	1175/16384	0.0717163
-0.1333841577	0.3870880564	147/2048	0.0717773
-0.1333828522	0.3869813048	1177/16384	0.0718384
-0.1333622968	0.3869782413	49/682	0.0718475
-0.1333262863	0.386961702	589/8192	0.0718994
-0.1333059096	0.3869391934	21/292	0.0719178
-0.1333000564	0.3869480105	145/2016	0.0719246
-0.1332569672	0.3869369238	1179/16384	0.0719604
-0.1333016888	0.3868535506	295/4096	0.0720215
-0.1333543406	0.3868075759	49/680	0.0720588
-0.1333461494	0.3867775477	143/1984	0.0720766
-0.1333567055	0.386782633	1181/16384	0.0720825
-0.1333988336	0.3867391532	591/8192	0.0721436
-0.1334866753	0.3867310755	1183/16384	0.0722046
-0.1334896548	0.3868150881	37/512	0.0722656
-0.1334896548	0.3868150881	37/512	0.0722656
-0.1335746008	0.3869654486	1185/16384	0.0723267
-0.1337018317	0.3869288398	147/2032	0.0723425
-0.1337553095	0.3867655482	593/8192	0.0723877
-0.1340007622	0.3868881043	139/1920	0.0723958
-0.1336045358	0.3866496069	1187/16384	0.0724487
-0.1335422885	0.3865893749	297/4096	0.0725098
-0.1334925861	0.3865965019	1189/16384	0.0725708
-0.1334668446	0.3866125092	595/8192	0.0726318
-0.1334142459	0.3866033483	1191/16384	0.0726929
-0.1334271878	0.3865616073	149/2048	0.0727539
-0.1333856475	0.3865236848	1193/16384	0.0728149
-0.1333800864	0.3865325427	149/2046	0.072825
-0.1333660831	0.3865460894	597/8192	0.072876
-0.13335587	0.38655328	149/2044	0.0728963
-0.1333587334	0.3865613771	7/96	0.0729167
-0.1333542077	0.3865714618	1195/16384	0.072937
-0.1333135739	0.3865615872	299/4096	0.072998
-0.1332697459	0.3865393377	149/2040	0.0730392
-0.1332442577	0.3865433996	1197/16384	0.0730591
-0.1332296241	0.3865740061	145/1984	0.0730847
-0.1331668829	0.3865084689	599/8192	0.0731201
-0.1331859098	0.3863438478	1199/16384	0.0731812
-0.1332872208	0.3863957789	75/1024	0.0732422
-0.1332872208	0.3863957789	75/1024	0.0732422
-0.1334531099	0.3863773011	1201/16384	0.0733032
-0.1334029167	0.3862933333	149/2032	0.0733268
-0.1333589243	0.386210467	601/8192	0.0733643
-0.1332797032	0.386201141	1203/16384	0.0734253
-0.1332545915	0.386190691	47/640	0.0734375
-0.1332635406	0.3861249852	301/4096	0.0734863
-0.1332040524	0.3860593551	1205/16384	0.0735474
-0.1331806002	0.3860719559	113/1536	0.0735677
-0.1331181388	0.3860232471	603/8192	0.0736084
-0.1330502771	0.385718903	1207/16384	0.0736694
-0.1333065562	0.3858321683	151/2048	0.0737305
-0.1335375812	0.3858252054	1209/16384	0.0737915
-0.1335412454	0.3857894824	151/2046	0.0738025
-0.1335955296	0.3857188547	605/8192	0.0738525
-0.133637694	0.3856815913	151/2044	0.0738748
-0.1336800526	0.3854964011	149/2016	0.0739087
-0.133689679	0.3855918483	1211/16384	0.0739136
-0.1338135839	0.3857322502	303/4096	0.0739746
-0.1338881926	0.3858331914	151/2040	0.0740196
-0.1339109509	0.3858635072	1213/16384	0.0740356
-0.1339640343	0.3859835598	147/1984	0.0740927
-0.1339705668	0.3859571271	607/8192	0.0740967
-0.133934675	0.3861305807	1215/16384	0.0741577
-0.1337863816	0.3860780503	19/256	0.0742188
-0.1337863816	0.3860780503	19/256	0.0742188
-0.1335326887	0.3861567742	1217/16384	0.0742798
-0.1336230916	0.3862770049	151/2032	0.074311
-0.1336634282	0.386410426	609/8192	0.0743408
-0.1339027325	0.3864234813	1219/16384	0.0744019
-0.1341049912	0.3865198433	305/4096	0.0744629
-0.1340007622	0.3868881043	143/1920	0.0744792
-0.1343635033	0.3863137768	1221/16384	0.0745239
-0.1342636641	0.3861675113	611/8192	0.074585
-0.1342619615	0.3860026391	1223/16384	0.074646
-0.134370844	0.3859901668	153/2048	0.074707
-0.1343824997	0.3858715002	1225/16384	0.0747681
-0.1343645581	0.3858769592	51/682	0.0747801
-0.1343326057	0.3858657761	613/8192	0.0748291
-0.1343116578	0.3858603199	153/2044	0.0748532
-0.134303706	0.3858662896	115/1536	0.0748698
-0.1342852076	0.3858656351	1227/16384	0.0748901
-0.13426784	0.3858566071	151/2016	0.0749008
-0.1342785677	0.3858016887	307/4096	0.0749512
-0.134270954	0.3857317263	3/40	0.075
-0.1342746413	0.3857122285	1229/16384	0.0750122
-0.1342883425	0.3856362388	615/8192	0.0750732
-0.1343437782	0.3855979174	149/1984	0.0751008
-0.134393054	0.3855917693	1231/16384	0.0751343
-0.1344216203	0.3856754973	77/1024	0.0751953
-0.1344216203	0.3856754973	77/1024	0.0751953
-0.1345968771	0.385763322	1233/16384	0.0752563
-0.1345374172	0.385592802	153/2032	0.0752953
-0.1345498917	0.385555373	617/8192	0.0753174
-0.1345229085	0.3855330546	135/1792	0.0753348
-0.1344921239	0.3855365031	1235/16384	0.0753784
-0.1344902789	0.3854847658	309/4096	0.0754395
-0.1344553834	0.3854435983	1237/16384	0.0755005
-0.1344426898	0.3854509694	29/384	0.0755208
-0.1344102739	0.3854289474	619/8192	0.0755615
-0.134317015	0.3853103481	1239/16384	0.0756226
-0.1344849876	0.3852904402	155/2048	0.0756836
-0.1346706066	0.3852092457	1241/16384	0.0757446
-0.1346508256	0.3851748872	5/66	0.0757576
-0.1346788891	0.3850831717	621/8192	0.0758057
-0.1346854903	0.3850094352	155/2044	0.0758317
-0.1346931962	0.384888978	1243/16384	0.0758667
-0.1349511926	0.384984457	311/4096	0.0759277
-0.1351679423	0.3851263082	31/408	0.0759804
-0.1351407723	0.385175905	1245/16384	0.0759888
-0.1352018435	0.3853264935	623/8192	0.0760498
-0.1350980192	0.3855120436	151/1984	0.0761089
-0.1351171035	0.3855059798	1247/16384	0.0761108
-0.1349670849	0.3854386153	39/512	0.0761719
-0.1349670849	0.3854386153	39/512	0.0761719
-0.1346942163	0.3855211457	1249/16384	0.0762329
-0.1348817758	0.3857456921	155/2032	0.0762795
-0.1348504834	0.3858211105	625/8192	0.0762939
-0.1351166841	0.3857602574	1251/16384	0.076355
-0.1352524654	0.3857430494	313/4096	0.076416
-0.1353106108	0.3856945788	137/1792	0.0764509
-0.1353035483	0.3856763802	1253/16384	0.0764771
-0.1353180368	0.3856251969	627/8192	0.0765381
-0.135353684	0.3855969092	49/640	0.0765625
-0.1354101344	0.3855747995	1255/16384	0.0765991
-0.1354325786	0.38565759	157/2048	0.0766602
-0.1355375087	0.3856837503	1257/16384	0.0767212
-0.1355323266	0.3856619214	157/2046	0.0767351
-0.1355520787	0.385631411	629/8192	0.0767822
-0.1355575202	0.3856019817	157/2044	0.0768102
-0.1355552944	0.3855747493	1259/16384	0.0768433
-0.1356884897	0.3854596698	155/2016	0.0768849
-0.1356436549	0.3855710652	315/4096	0.0769043
-0.1358051785	0.3855777909	157/2040	0.0769608
-0.1357911128	0.3856025296	1261/16384	0.0769653
-0.1359073261	0.3856816819	631/8192	0.0770264
-0.1358614161	0.3858919228	1263/16384	0.0770874
-0.1357448534	0.3859192353	153/1984	0.0771169
-0.135729697	0.38583526	79/1024	0.0771484
-0.135729697	0.38583526	79/1024	0.0771484
-0.1355062263	0.3859154712	1265/16384	0.0772095
-0.1357205312	0.3860750415	157/2032	0.0772638
-0.1357034882	0.3860844287	633/8192	0.0772705
-0.1357854844	0.3860619799	1267/16384	0.0773315
-0.1358233641	0.3861262292	317/4096	0.0773926
-0.1358919532	0.3861649819	1269/16384	0.0774536
-0.1359071878	0.3861488482	119/1536	0.077474
-0.1359629915	0.3861708539	635/8192	0.0775146
-0.1360717652	0.3863382475	1271/16384	0.0775757
-0.1359206563	0.3864575626	149/1920	0.0776042
-0.1358960716	0.3863524391	159/2048	0.0776367
-0.1357470634	0.3864748172	1273/16384	0.0776978
-0.1357817014	0.3865035751	53/682	0.0777126
-0.1357881071	0.3865707298	637/8192	0.0777588
-0.1358041416	0.3866422039	159/2044	0.0777886
-0.1358411555	0.3866897716	1275/16384	0.0778198
-0.1356447462	0.3867141149	157/2016	0.077877
-0.1356724725	0.3867424896	319/4096	0.0778809
-0.1354628464	0.3867509329	53/680	0.0779412
-0.1354679228	0.386759018	1277/16384	0.0779419
-0.135308827	0.3867403234	639/8192	0.0780029
-0.1351874954	0.3865143936	1279/16384	0.078064
-0.1353844001	0.3864539263	5/64	0.078125
-0.1353844001	0.3864539263	5/64	0.078125
-0.1355908369	0.386218253	1281/16384	0.078186
-0.1352845562	0.3860122264	641/8192	0.0782471
-0.1352713839	0.3860508053	159/2032	0.078248
-0.1350066471	0.3861688711	1283/16384	0.0783081
-0.1347590231	0.3862088169	321/4096	0.0783691
-0.1345567646	0.3865045676	1285/16384	0.0784302
-0.1347233056	0.3866824947	643/8192	0.0784912
-0.134806575	0.3869862072	1287/16384	0.0785522
-0.1345404085	0.3870477578	161/2048	0.0786133
-0.1340007622	0.3868881043	151/1920	0.0786458
-0.1343262497	0.3874460014	1289/16384	0.0786743
-0.1344554171	0.3875280419	141/1792	0.078683
-0.1344769171	0.3875220891	161/2046	0.0786901
-0.1347272464	0.3875623514	645/8192	0.0787354
-0.134898766	0.387516593	23/292	0.0787671
-0.1348722626	0.3874616093	121/1536	0.078776
-0.1349392205	0.38740627	1291/16384	0.0787964
-0.135182155	0.3875336035	323/4096	0.0788574
-0.1350373055	0.3876964902	53/672	0.078869
-0.135512259	0.3875839955	1293/16384	0.0789185
-0.1355346395	0.3876364318	161/2040	0.0789216
-0.1357592245	0.3875897797	647/8192	0.0789795
-0.1360363138	0.3878571325	1295/16384	0.0790405
-0.1357847864	0.3881019268	81/1024	0.0791016
-0.1357847864	0.3881019268	81/1024	0.0791016
-0.1352698842	0.3880818466	157/1984	0.0791331
-0.1357433035	0.3889743403	1297/16384	0.0791626
-0.136573899	0.388375672	649/8192	0.0792236
-0.1368161005	0.3881782026	161/2032	0.0792323
-0.1364688048	0.3880688795	1299/16384	0.0792847
-0.1366509733	0.3878832744	325/4096	0.0793457
-0.1366239334	0.3876068556	1301/16384	0.0794067
-0.1364784785	0.3874898252	651/8192	0.0794678
-0.1363559642	0.3871552536	1303/16384	0.0795288
-0.1366614628	0.3870919545	163/2048	0.0795898
-0.1367559783	0.3867686882	1305/16384	0.0796509
-0.1366887135	0.3867772593	163/2046	0.0796676
-0.136635933	0.3867795014	51/640	0.0796875
-0.1366374898	0.3867179138	653/8192	0.0797119
-0.1365718266	0.3866630593	163/2044	0.0797456
-0.1365266433	0.3866434873	1307/16384	0.0797729
-0.1366217242	0.3865289625	327/4096	0.079834
-0.1367134115	0.3864786287	23/288	0.0798611
-0.1367079749	0.3864230221	1309/16384	0.079895
-0.1367160705	0.3864006021	163/2040	0.079902
-0.1367560429	0.3863569722	655/8192	0.0799561
-0.1368713889	0.3863143236	1311/16384	0.0800171
-0.1369132455	0.3864368803	41/512	0.0800781
-0.1369132455	0.3864368803	41/512	0.0800781
-0.137190564	0.3866779079	1313/16384	0.0801392
-0.1371051513	0.3867376322	159/1984	0.0801411
-0.1372444849	0.3861568915	657/8192	0.0802002
-0.1371532802	0.3859883946	163/2032	0.0802165
-0.1369614989	0.3861264195	1315/16384	0.0802612
-0.1368538962	0.3861240539	329/4096	0.0803223
-0.1368118687	0.3861581471	1317/16384	0.0803833
-0.1367950357	0.3861848061	659/8192	0.0804443
-0.1367384308	0.3861944787	1319/16384	0.0805054
-0.1367393592	0.3861499397	165/2048	0.0805664
-0.1366871397	0.3861249969	1321/16384	0.0806274
-0.1366888358	0.3861385403	5/62	0.0806452
-0.1366767667	0.3861504062	661/8192	0.0806885
-0.1366712106	0.3861669035	165/2044	0.0807241
-0.136673195	0.3861665047	31/384	0.0807292
-0.1366710762	0.3861766293	1323/16384	0.0807495
-0.1366318629	0.3861736879	331/4096	0.0808105
-0.1365880082	0.3861587205	163/2016	0.0808532
-0.1365646422	0.3861612241	1325/16384	0.0808716
-0.1365488799	0.3861650446	11/136	0.0808824
-0.1364981459	0.3861321645	663/8192	0.0809326
-0.1365138536	0.3860027294	1327/16384	0.0809937
-0.1365919947	0.3860383344	83/1024	0.0810547
-0.1365919947	0.3860383344	83/1024	0.0810547
-0.136724623	0.3860090268	1329/16384	0.0811157
-0.1366419597	0.3859120796	161/1984	0.0811492
-0.1366193715	0.3858902337	665/8192	0.0811768
-0.1365919228	0.3858901714	165/2032	0.0812008
-0.1365687552	0.38589905	1331/16384	0.0812378
-0.1365509302	0.3858566987	333/4096	0.0812988
-0.1365126118	0.3858245101	1333/16384	0.0813599
-0.1365008023	0.3858327966	125/1536	0.0813802
-0.1364679201	0.3858102131	667/8192	0.0814209
-0.1364387831	0.3856759376	1335/16384	0.0814819
-0.1365430724	0.3857139316	167/2048	0.081543
-0.1366405241	0.3856761888	1337/16384	0.081604
-0.1366253832	0.3856594429	167/2046	0.0816227
-0.1366360603	0.3856285157	669/8192	0.081665
-0.1366348494	0.3855952388	167/2044	0.0817025
-0.1366356731	0.3855733693	1339/16384	0.0817261
-0.1367315163	0.385561118	157/1920	0.0817708
-0.1367023047	0.3855784362	335/4096	0.0817871
-0.1367811505	0.3855795336	55/672	0.0818452
-0.1367767405	0.3855844267	1341/16384	0.0818481
-0.1367913054	0.3855706413	167/2040	0.0818627
-0.1368337975	0.3855887016	671/8192	0.0819092
-0.1369030942	0.3856769153	1343/16384	0.0819702
-0.1368072634	0.3857137484	21/256	0.0820312
-0.1368072634	0.3857137484	21/256	0.0820312
-0.1366848986	0.3858246641	1345/16384	0.0820923
-0.13684561	0.3859664943	673/8192	0.0821533
-0.1367950265	0.3859534173	163/1984	0.0821573
-0.1369120152	0.3860282891	167/2032	0.082185
-0.13705423	0.3858863057	1347/16384	0.0822144
-0.1372412505	0.3857923956	337/4096	0.0822754
-0.1373315473	0.3855802531	1349/16384	0.0823364
-0.1370573651	0.3854636917	675/8192	0.0823975
-0.13693507	0.3854422286	1351/16384	0.0824585
-0.1369401475	0.385374127	169/2048	0.0825195
-0.1368698837	0.3853588163	1353/16384	0.0825806
-0.1368758345	0.3853709831	169/2046	0.0826002
-0.1368646636	0.3853848805	677/8192	0.0826416
-0.1368621122	0.3854009149	169/2044	0.082681
-0.1368622027	0.3854004657	127/1536	0.0826823
-0.1368599471	0.3854098788	1355/16384	0.0827026
-0.1368272148	0.3854059981	339/4096	0.0827637
-0.1367920158	0.3854016269	53/640	0.0828125
-0.1367835832	0.3853981474	1357/16384	0.0828247
-0.136775273	0.3854028614	167/2016	0.0828373
-0.1367729185	0.3854061058	169/2040	0.0828431
-0.1367515748	0.3853863839	679/8192	0.0828857
-0.136736849	0.3853382384	1359/16384	0.0829468
-0.1367769504	0.3853281196	85/1024	0.0830078
-0.1367769504	0.3853281196	85/1024	0.0830078
-0.1368362642	0.3852379981	1361/16384	0.0830688
-0.1367150832	0.3852659313	681/8192	0.0831299
-0.13670718	0.3852807231	149/1792	0.0831473
-0.1367113587	0.3852860441	165/1984	0.0831653
-0.1367129835	0.3852860694	169/2032	0.0831693
-0.1367108373	0.3852938939	1363/16384	0.0831909
-0.1366886358	0.3852973711	341/4096	0.083252
-0.1366731617	0.385314023	1365/16384	0.083313
-0.1366695879	0.3853319309	683/8192	0.083374
-0.1366308077	0.3853680231	1367/16384	0.0834351
-0.1366152339	0.3853132608	171/2048	0.0834961
-0.1365599279	0.3852554046	1369/16384	0.0835571
-0.1365515543	0.3852741668	57/682	0.0835777
-0.1365177267	0.3852784499	685/8192	0.0836182
-0.136488022	0.3853004304	171/2044	0.0836595
-0.1364633882	0.385317101	1371/16384	0.0836792
-0.1364159789	0.3852252698	343/4096	0.0837402
-0.1364100448	0.3850854177	1373/16384	0.0838013
-0.136372663	0.3850612538	57/680	0.0838235
-0.1363193578	0.385014251	169/2016	0.0838294
-0.1364802843	0.384957883	161/1920	0.0838542
-0.1364520668	0.3849898761	687/8192	0.0838623
-0.1365937474	0.384966467	1375/16384	0.0839233
-0.1365974658	0.3850781787	43/512	0.0839844
-0.1365974658	0.3850781787	43/512	0.0839844
-0.1366843727	0.3852115854	1377/16384	0.0840454
-0.1368608538	0.3851049479	689/8192	0.0841064
-0.1368332486	0.3849053114	171/2032	0.0841535
-0.1367904651	0.38487816	1379/16384	0.0841675
-0.136758517	0.3848380579	167/1984	0.0841734
-0.1367226776	0.3847749798	345/4096	0.0842285
-0.1366575439	0.3847462927	151/1792	0.0842634
-0.1366459105	0.3847595778	1381/16384	0.0842896
-0.136598313	0.3847705127	691/8192	0.0843506
-0.136509459	0.3847215033	1383/16384	0.0844116
-0.1365698281	0.384656068	173/2048	0.0844727
-0.1365303565	0.384536046	1385/16384	0.0845337
-0.1365154653	0.3845602942	173/2046	0.0845552
-0.1364698307	0.3845570541	693/8192	0.0845947
-0.1364399892	0.3845808067	173/2044	0.084638
-0.1364139719	0.3845950085	1387/16384	0.0846558
-0.1363394635	0.3845145924	347/4096	0.0847168
-0.1362182851	0.384323507	1389/16384	0.0847778
-0.1361083011	0.3843810784	173/2040	0.0848039
-0.1361726723	0.3840622076	695/8192	0.0848389
-0.13669394	0.3839349089	163/1920	0.0848958
-0.1366254404	0.3839092786	1391/16384	0.0848999
-0.1366081033	0.3841949872	87/1024	0.0849609
-0.1366081033	0.3841949872	87/1024	0.0849609
-0.1368179463	0.3844930239	1393/16384	0.085022
-0.1370422183	0.384144919	697/8192	0.085083
-0.1369622915	0.3840092817	173/2032	0.0851378
-0.136998717	0.3840082808	1395/16384	0.085144
-0.1370847382	0.3838699202	169/1984	0.0851815
-0.1371216806	0.3839458016	349/4096	0.0852051
-0.137221712	0.3838239141	1397/16384	0.0852661
-0.1371961114	0.3837855137	131/1536	0.0852865
-0.1372790636	0.3836852036	699/8192	0.0853271
-0.1377067764	0.3836736596	1399/16384	0.0853882
-0.137541058	0.3839506265	175/2048	0.0854492
-0.1376218867	0.3842381154	1401/16384	0.0855103
-0.1376655887	0.3841896253	175/2046	0.0855327
-0.1377486783	0.3842417707	701/8192	0.0855713
-0.1378527584	0.3842259487	25/292	0.0856164
-0.1379009795	0.3842600913	1403/16384	0.0856323
-0.1378588957	0.3844474737	351/4096	0.0856934
-0.1377892981	0.3846628378	1405/16384	0.0857544
-0.13783277	0.3847707272	35/408	0.0857843
-0.1376891391	0.3847906188	173/2016	0.0858135
-0.1377154758	0.3848124908	703/8192	0.0858154
-0.1374439937	0.3848658342	1407/16384	0.0858765
-0.1374407297	0.3846354606	11/128	0.0859375
-0.1374407297	0.3846354606	11/128	0.0859375
-0.1372000636	0.3842988114	1409/16384	0.0859985
-0.136932718	0.3846886799	705/8192	0.0860596
-0.1370663659	0.3849848837	1411/16384	0.0861206
-0.1370203904	0.3849634174	175/2032	0.086122
-0.1370828131	0.3851688774	353/4096	0.0861816
-0.1370216683	0.3850908765	171/1984	0.0861895
-0.1371269889	0.3853343047	1413/16384	0.0862427
-0.1374642206	0.3853872617	707/8192	0.0863037
-0.1377797669	0.3853923426	1415/16384	0.0863647
-0.1377409589	0.3856372476	177/2048	0.0864258
-0.1379901846	0.385877591	1417/16384	0.0864868
-0.1380337857	0.3858185512	155/1792	0.0864955
-0.1380126203	0.3857808199	59/682	0.0865103
-0.1381334269	0.3857517365	709/8192	0.0865479
-0.1382172829	0.3856248182	133/1536	0.0865885
-0.138223829	0.3855854983	177/2044	0.0865949
-0.1382536947	0.3855193508	1419/16384	0.0866089
-0.1385653094	0.3851079635	355/4096	0.0866699
-0.1385384261	0.3847905923	1421/16384	0.086731
-0.1384582372	0.3846758139	59/680	0.0867647
-0.1385446361	0.3846299816	711/8192	0.086792
-0.1386374078	0.3845938324	25/288	0.0868056
-0.1386958	0.3844958196	1423/16384	0.086853
-0.1388162876	0.3846074831	89/1024	0.0869141
-0.1388162876	0.3846074831	89/1024	0.0869141
-0.1392249573	0.3844987496	1425/16384	0.0869751
-0.1394293948	0.384512658	167/1920	0.0869792
-0.1388425021	0.3842960246	713/8192	0.0870361
-0.1387735542	0.3843403431	1427/16384	0.0870972
-0.1387474943	0.3843356748	177/2032	0.0871063
-0.138728895	0.3842930454	357/4096	0.0871582
-0.1386792967	0.3842695535	173/1984	0.0871976
-0.1386651057	0.3842785684	1429/16384	0.0872192
-0.1386160801	0.3842916745	715/8192	0.0872803
-0.1384845302	0.3842238183	1431/16384	0.0873413
-0.1386064393	0.3841417625	179/2048	0.0874023
-0.1386756795	0.3839690953	1433/16384	0.0874634
-0.1386267602	0.3839810575	179/2046	0.0874878
-0.1386041003	0.3839142389	717/8192	0.0875244
-0.1385209331	0.3838824824	179/2044	0.0875734
-0.1385113469	0.3838354445	1435/16384	0.0875854
-0.1386373211	0.3837318771	359/4096	0.0876465
-0.1388016471	0.3836497031	1437/16384	0.0877075
-0.1388688907	0.3835304915	179/2040	0.0877451
-0.1389149024	0.3836151052	719/8192	0.0877686
-0.1390249937	0.3836617829	59/672	0.0877976
-0.1390883245	0.3837048913	1439/16384	0.0878296
-0.1389755474	0.3838505108	45/512	0.0878906
-0.1389755474	0.3838505108	45/512	0.0878906
-0.1388797054	0.3841643074	1441/16384	0.0879517
-0.139399243	0.384237135	721/8192	0.0880127
-0.1394293948	0.384512658	169/1920	0.0880208
-0.1394846421	0.3836383527	1443/16384	0.0880737
-0.1393498828	0.3835934614	179/2032	0.0880906
-0.1393636186	0.3834787556	361/4096	0.0881348
-0.1392565066	0.3834473083	1445/16384	0.0881958
-0.1392411875	0.3834566725	175/1984	0.0882056
-0.139194848	0.383451812	723/8192	0.0882568
-0.1391023599	0.3833752136	1447/16384	0.0883179
-0.1391803931	0.3833112941	181/2048	0.0883789
-0.1391284635	0.383170955	1449/16384	0.0884399
-0.1391194765	0.3832099468	181/2046	0.0884653
-0.1390713004	0.3832000548	725/8192	0.088501
-0.139042792	0.3832420095	181/2044	0.0885519
-0.1390193258	0.3832384032	1451/16384	0.088562
-0.1389513422	0.3831725613	363/4096	0.088623
-0.1388116712	0.3830450122	1453/16384	0.0886841
-0.1385772073	0.3831189519	181/2040	0.0887255
-0.1386691838	0.3828821352	727/8192	0.0887451
-0.1386558989	0.3823431798	179/2016	0.0887897
-0.1389605465	0.3824504826	1455/16384	0.0888062
-0.139125533	0.3827831869	91/1024	0.0888672
-0.139125533	0.3827831869	91/1024	0.0888672
-0.1394800127	0.3831321518	1457/16384	0.0889282
-0.1397298982	0.3824056508	729/8192	0.0889893
-0.1395324965	0.3822394086	1459/16384	0.0890503
-0.1394818156	0.3821514594	57/640	0.0890625
-0.1393716615	0.3820838296	181/2032	0.0890748
-0.1396571576	0.3820140647	365/4096	0.0891113
-0.139659559	0.3816729306	1461/16384	0.0891724
-0.1395605789	0.3816517657	137/1536	0.0891927
-0.1393611123	0.3816436748	177/1984	0.0892137
-0.139529247	0.3813702651	731/8192	0.0892334
-0.1402697878	0.3803203389	1463/16384	0.0892944
-0.1405245278	0.3814529325	183/2048	0.0893555
-0.141145365	0.382274486	1465/16384	0.0894165
-0.1412377903	0.3819790141	61/682	0.0894428
-0.1415446194	0.3822320877	733/8192	0.0894775
-0.1422695744	0.3819182845	183/2044	0.0895303
-0.1421292179	0.3823560418	1467/16384	0.0895386
-0.1418012955	0.3829489904	367/4096	0.0895996
-0.1414444488	0.383448747	1469/16384	0.0896606
-0.141302795	0.3839152053	61/680	0.0897059
-0.1412288249	0.3837211068	735/8192	0.0897217
-0.1406558906	0.3837254429	181/2016	0.0897817
-0.1406422601	0.3837785004	1471/16384	0.0897827
-0.1406772879	0.3832640042	23/256	0.0898438
-0.1406772879	0.3832640042	23/256	0.0898438
-0.1400720894	0.3825199833	1473/16384	0.0899048
-0.1396382479	0.3833552478	737/8192	0.0899658
-0.1397712269	0.3840503306	1475/16384	0.0900269
-0.1399634128	0.3842690478	183/2032	0.0900591
-0.1398393598	0.3844272703	369/4096	0.0900879
-0.1394293948	0.384512658	173/1920	0.0901042
-0.1399963325	0.3847528057	1477/16384	0.0901489
-0.1409413116	0.3850366449	739/8192	0.09021
-0.1412356927	0.384906969	179/1984	0.0902218
-0.1413793045	0.3846637726	1479/16384	0.090271
-0.1415316053	0.3849287937	185/2048	0.090332
-0.1418725722	0.3848299316	1481/16384	0.0903931
-0.1417795708	0.3847872334	185/2046	0.0904203
-0.1418260799	0.3847132913	741/8192	0.0904541
-0.1417978409	0.3846360637	139/1536	0.0904948
-0.141749357	0.384596007	185/2044	0.0905088
-0.1417837624	0.3845904683	1483/16384	0.0905151
-0.1419455625	0.3845266111	371/4096	0.0905762
-0.1422186932	0.3844642613	1485/16384	0.0906372
-0.1425860921	0.3844014778	37/408	0.0906863
-0.1424408441	0.3844645147	743/8192	0.0906982
-0.1426064963	0.3847832609	1487/16384	0.0907593
-0.1425539162	0.3849113388	61/672	0.0907738
-0.14235021	0.3848644748	93/1024	0.0908203
-0.14235021	0.3848644748	93/1024	0.0908203
-0.1420145947	0.3853233287	1489/16384	0.0908813
-0.142782092	0.3852821499	745/8192	0.0909424
-0.1428251763	0.3851747829	163/1792	0.0909598
-0.1427951868	0.3850948038	1491/16384	0.0910034
-0.1429428831	0.3849907844	185/2032	0.0910433
-0.1429442845	0.3850757912	373/4096	0.0910645
-0.1430745058	0.3849620308	1493/16384	0.0911255
-0.1430480861	0.3849239035	35/384	0.0911458
-0.1431069071	0.38483063	747/8192	0.0911865
-0.1432167788	0.384594473	181/1984	0.0912298
-0.1434901109	0.384533558	1495/16384	0.0912476
-0.1435010004	0.3850664847	187/2048	0.0913086
-0.1436557813	0.385787923	1497/16384	0.0913696
-0.1439005276	0.3855816763	17/186	0.0913978
-0.1440133541	0.3858294181	749/8192	0.0914307
-0.1449624975	0.3860483438	187/2044	0.0914873
-0.1445472119	0.3860234017	1499/16384	0.0914917
-0.1440965406	0.386598122	375/4096	0.0915527
-0.1434291837	0.3869263484	1501/16384	0.0916138
-0.1428833131	0.3869803599	11/120	0.0916667
-0.1430357649	0.3870046929	751/8192	0.0916748
-0.1426115609	0.3866590233	1503/16384	0.0917358
-0.1426145741	0.3862838044	185/2016	0.0917659
-0.1429212184	0.3863275576	47/512	0.0917969
-0.1429212184	0.3863275576	47/512	0.0917969
-0.1429552065	0.3855081899	1505/16384	0.0918579
-0.142007489	0.3857098942	753/8192	0.0919189
-0.1415972657	0.3866310221	1507/16384	0.09198
-0.1419548885	0.3870004722	187/2032	0.0920276
-0.141880565	0.3869797944	377/4096	0.092041
-0.1420249383	0.3871366968	165/1792	0.0920759
-0.1420661221	0.387114698	1509/16384	0.0921021
-0.1421947264	0.3871497269	755/8192	0.0921631
-0.1422568043	0.3872585855	59/640	0.0921875
-0.1422998465	0.3874020818	1511/16384	0.0922241
-0.1422338326	0.3874928367	183/1984	0.0922379
-0.1420871756	0.3874234486	189/2048	0.0922852
-0.1419593312	0.3877106269	1513/16384	0.0923462
-0.1420700959	0.3876767369	63/682	0.0923754
-0.1420979862	0.3877435829	757/8192	0.0924072
-0.1422706784	0.3877739013	27/292	0.0924658
-0.1422398435	0.3877674672	1515/16384	0.0924683
-0.1422238585	0.3879808649	379/4096	0.0925293
-0.1420635795	0.3883497855	1517/16384	0.0925903
-0.1416829418	0.3885633467	63/680	0.0926471
-0.141817717	0.3886276872	759/8192	0.0926514
-0.1412749582	0.3883533134	1519/16384	0.0927124
-0.1414602735	0.3879256445	187/2016	0.0927579
-0.1415329175	0.3880718397	95/1024	0.0927734
-0.1415329175	0.3880718397	95/1024	0.0927734
-0.1415768313	0.3874691059	1521/16384	0.0928345
-0.1408810045	0.3877652959	761/8192	0.0928955
-0.1408982511	0.3879987208	1523/16384	0.0929565
-0.1406620908	0.3880339031	189/2032	0.0930118
-0.1407107745	0.3880439655	381/4096	0.0930176
-0.1405442636	0.3881735194	1525/16384	0.0930786
-0.1405698387	0.3882282453	143/1536	0.093099
-0.1404639113	0.3883403721	763/8192	0.0931396
-0.1399303798	0.388378277	1527/16384	0.0932007
-0.139893545	0.3879015386	179/1920	0.0932292
-0.1400701682	0.3878494884	185/1984	0.093246
-0.1401317791	0.3879894154	191/2048	0.0932617
-0.1400520305	0.3875079986	1529/16384	0.0933228
-0.1399202279	0.3875950099	191/2046	0.0933529
-0.1398243002	0.3875134512	765/8192	0.0933838
-0.1395777283	0.3874676246	191/2044	0.0934442
-0.1395563672	0.3874874686	1531/16384	0.0934448
-0.1396267867	0.3871547052	383/4096	0.0935059
-0.1397781032	0.3867740586	1533/16384	0.0935669
-0.1398801424	0.3865122967	191/2040	0.0936275
-0.1399169175	0.3864997535	767/8192	0.0936279
-0.1404685004	0.3864286189	1535/16384	0.093689
-0.1403979244	0.3868767244	3/32	0.09375
-0.1403979244	0.3868767244	3/32	0.09375
-0.1406200463	0.3875363422	1537/16384	0.093811
-0.1413998127	0.3871168501	769/8192	0.0938721
-0.1416840709	0.3861716794	1539/16384	0.0939331
-0.1414015694	0.3856830054	385/4096	0.0939941
-0.1412884502	0.3857293843	191/2032	0.0939961
-0.1411599269	0.3853485228	1541/16384	0.0940552
-0.1401742636	0.3850889013	771/8192	0.0941162
-0.1396413799	0.3854589269	1543/16384	0.0941772
-0.1395144949	0.3850983247	193/2048	0.0942383
-0.139816878	0.3849404813	187/1984	0.094254
-0.1394293948	0.384512658	181/1920	0.0942708
-0.1390948381	0.3850165091	1545/16384	0.0942993
-0.1390876202	0.3850915596	169/1792	0.094308
-0.1391378577	0.385122302	193/2046	0.0943304
-0.1390211099	0.3851967222	773/8192	0.0943604
-0.1389768935	0.3853564368	145/1536	0.094401
-0.1389631971	0.3854814161	1547/16384	0.0944214
-0.1389923168	0.3854211653	193/2044	0.0944227
-0.1385922849	0.3859783603	387/4096	0.0944824
-0.1385206716	0.3864144066	1549/16384	0.0945435
-0.1384278559	0.3866680528	775/8192	0.0946045
-0.1384873998	0.3865863365	193/2040	0.0946078
-0.1380592492	0.3867631567	1551/16384	0.0946655
-0.1380076548	0.3864836184	97/1024	0.0947266
-0.1380076548	0.3864836184	97/1024	0.0947266
-0.1382430386	0.3864187191	191/2016	0.0947421
-0.137578442	0.3862049657	1553/16384	0.0947876
-0.137518228	0.3867568603	777/8192	0.0948486
-0.137686485	0.3868807326	1555/16384	0.0949097
-0.1376378537	0.387076376	389/4096	0.0949707
-0.1375467602	0.3869313516	193/2032	0.0949803
-0.1377743581	0.3872956292	1557/16384	0.0950317
-0.1379698197	0.387328192	779/8192	0.0950928
-0.1383447591	0.3875992826	1559/16384	0.0951538
-0.1379868228	0.3879004471	195/2048	0.0952148
-0.1378437023	0.3884723692	189/1984	0.0952621
-0.137979031	0.3885177845	1561/16384	0.0952759
-0.1381483525	0.3884547726	65/682	0.0953079
-0.1382194056	0.3884127717	61/640	0.0953125
-0.1382652368	0.3885348171	781/8192	0.0953369
-0.1385672533	0.3885812461	1563/16384	0.0953979
-0.1385123132	0.3886386511	195/2044	0.0954012
-0.1384801777	0.388943466	391/4096	0.095459
-0.1383341987	0.3893147924	1565/16384	0.09552
-0.138237126	0.3895677207	783/8192	0.0955811
-0.1381673967	0.3894245948	13/136	0.0955882
-0.137838085	0.3897444033	1567/16384	0.0956421
-0.1377274887	0.3893569102	49/512	0.0957031
-0.1377274887	0.3893569102	49/512	0.0957031
-0.1379228867	0.388944833	193/2016	0.0957341
-0.137182263	0.3887232709	1569/16384	0.0957642
-0.136559915	0.3897684301	785/8192	0.0958252
-0.137214638	0.3903017596	1571/16384	0.0958862
-0.1378064815	0.3906699587	393/4096	0.0959473
-0.1382430792	0.3908456623	195/2032	0.0959646
-0.1380919326	0.3904618962	1573/16384	0.0960083
-0.1381683061	0.3902999361	787/8192	0.0960693
-0.1384458809	0.3902012848	1575/16384	0.0961304
-0.1384980132	0.3904235559	197/2048	0.0961914
-0.1388443868	0.3904905558	1577/16384	0.0962524
-0.1387920832	0.3904083314	191/1984	0.0962702
-0.1387964868	0.3903715444	197/2046	0.0962854
-0.1388224082	0.3903157083	789/8192	0.0963135
-0.1388039569	0.3902285041	37/384	0.0963542
-0.1387893883	0.3901781379	1579/16384	0.0963745
-0.1388376811	0.3901707802	197/2044	0.0963796
-0.1389622217	0.3900987381	395/4096	0.0964355
-0.1392627172	0.3899839353	1581/16384	0.0964966
-0.1395693112	0.3898723875	791/8192	0.0965576
-0.1395474865	0.3900734087	197/2040	0.0965686
-0.1400006526	0.3903450503	1583/16384	0.0966187
-0.1395677399	0.3905335409	99/1024	0.0966797
-0.1395677399	0.3905335409	99/1024	0.0966797
-0.1390539451	0.3906412722	65/672	0.0967262
-0.1389328525	0.3910725674	1585/16384	0.0967407
-0.1403996196	0.3915009035	793/8192	0.0968018
-0.1404072677	0.3909736918	1587/16384	0.0968628
-0.1407243577	0.3909010127	397/4096	0.0969238
-0.1409838294	0.3909030829	197/2032	0.0969488
-0.1409556727	0.3906955707	1589/16384	0.0969849
-0.140913883	0.3906226359	149/1536	0.0970052
-0.1410365189	0.3904628548	795/8192	0.0970459
-0.1416505287	0.3903396646	1591/16384	0.0971069
-0.1415189139	0.3908076881	199/2048	0.097168
-0.1418066871	0.3913314216	1593/16384	0.097229
-0.1419353446	0.3911342791	199/2046	0.097263
-0.14203699	0.3911009542	193/1984	0.0972782
-0.142018876	0.3911700936	797/8192	0.09729
-0.1422432977	0.3910657839	1595/16384	0.0973511
-0.1423366038	0.3911294921	199/2044	0.0973581
-0.1424676019	0.3913976239	187/1920	0.0973958
-0.1423549011	0.3913195786	399/4096	0.0974121
-0.1424820415	0.3916266494	1597/16384	0.0974731
-0.1426224275	0.3918352385	799/8192	0.0975342
-0.1424544776	0.3920203756	199/2040	0.097549
-0.1424783052	0.3923180015	1599/16384	0.0975952
-0.1420972237	0.3920627895	25/256	0.0976562
-0.1420972237	0.3920627895	25/256	0.0976562
-0.1412604185	0.3916495979	1601/16384	0.0977173
-0.1413952215	0.3916617912	197/2016	0.0977183
-0.1412794619	0.3935851749	801/8192	0.0977783
-0.1421901245	0.3933554603	1603/16384	0.0978394
-0.1434019654	0.3934039593	401/4096	0.0979004
-0.1437057585	0.3928288103	199/2032	0.0979331
-0.1435501881	0.3928598003	1605/16384	0.0979614
-0.1434686528	0.3925272869	803/8192	0.0980225
-0.1434422044	0.391781646	1607/16384	0.0980835
-0.1436209043	0.3914913214	201/2048	0.0981445
-0.1433979508	0.3912802191	1609/16384	0.0982056
-0.1433768512	0.3913818316	67/682	0.0982405
-0.1433406578	0.3913710301	805/8192	0.0982666
-0.1432920448	0.391383944	195/1984	0.0982863
-0.1432952973	0.3914148136	151/1536	0.0983073
-0.1432685655	0.3914401004	1611/16384	0.0983276
-0.1432138351	0.3914366837	201/2044	0.0983366
-0.1431839549	0.3913523262	403/4096	0.0983887
-0.1431168004	0.3912391023	63/640	0.0984375
-0.1431051171	0.3912101905	1613/16384	0.0984497
-0.1430617643	0.3911033941	807/8192	0.0985107
-0.1431293193	0.3910494329	67/680	0.0985294
-0.1431652594	0.3909740118	1615/16384	0.0985718
-0.1432542869	0.3910588048	101/1024	0.0986328
-0.1432542869	0.3910588048	101/1024	0.0986328
-0.1435488902	0.3910878397	1617/16384	0.0986938
-0.1435372952	0.3909609146	199/2016	0.0987103
-0.1433242204	0.3907616275	809/8192	0.0987549
-0.1432609468	0.3907843593	177/1792	0.0987723
-0.1432410796	0.3908254599	1619/16384	0.0988159
-0.1431887235	0.3907782905	405/4096	0.098877
-0.1431336707	0.3907499908	201/2032	0.0989173
-0.1431179621	0.3907646293	1621/16384	0.098938
-0.143068483	0.3907897424	811/8192	0.098999
-0.1429092735	0.3907425213	1623/16384	0.0990601
-0.1430315982	0.3906283327	203/2048	0.0991211
-0.1431578015	0.3903987265	1625/16384	0.0991821
-0.1430291261	0.3903880377	203/2046	0.099218
-0.1430303815	0.3903255909	813/8192	0.0992432
-0.1428942286	0.3903002219	197/1984	0.0992944
-0.1428728873	0.3902176527	1627/16384	0.0993042
-0.1428518778	0.3901198453	29/292	0.0993151
-0.143066171	0.3900225818	407/4096	0.0993652
-0.1434140221	0.3899436441	1629/16384	0.0994263
-0.1437194575	0.3900224487	191/1920	0.0994792
-0.1436446804	0.3899721086	815/8192	0.0994873
-0.1436954172	0.3901186689	203/2040	0.0995098
-0.1437651954	0.3902706791	1631/16384	0.0995483
-0.1435359115	0.3903252333	51/512	0.0996094
-0.1435359115	0.3903252333	51/512	0.0996094
-0.1432998524	0.3906026083	1633/16384	0.0996704
-0.1433990246	0.3906575749	67/672	0.0997024
-0.1436628232	0.3908712629	817/8192	0.0997314
-0.1439080647	0.3907364677	1635/16384	0.0997925
-0.144325229	0.3903937394	409/4096	0.0998535
-0.1442867496	0.3902228501	179/1792	0.0998884
-0.1442639522	0.3902443175	203/2032	0.0999016
-0.1442503615	0.3902247233	1637/16384	0.0999146
-0.1441772868	0.3901543429	819/8192	0.0999756
-0.1442036436	0.3899527955	1639/16384	0.100037
-0.1443475841	0.3900183622	205/2048	0.100098
-0.1445650855	0.3898759632	1641/16384	0.100159
-0.1444541468	0.3898476538	205/2046	0.100196
-0.1444720503	0.3898010271	821/8192	0.10022
-0.1443805743	0.3897294045	1643/16384	0.100281
-0.1443399489	0.3896822383	205/2044	0.100294
-0.1442990256	0.3896800319	199/1984	0.100302
-0.1444722813	0.3895820561	411/4096	0.100342
-0.1447672324	0.38937681	1645/16384	0.100403
-0.1451078573	0.3892934374	823/8192	0.100464
-0.1453222366	0.389567806	41/408	0.10049
-0.1452824586	0.3898869093	193/1920	0.100521
-0.1453046544	0.389816232	1647/16384	0.100525
-0.1449883367	0.3898348991	103/1024	0.100586
-0.1449883367	0.3898348991	103/1024	0.100586
-0.1446551979	0.3901639634	1649/16384	0.100647
-0.1451668579	0.3903609666	29/288	0.100694
-0.1452112888	0.390409491	825/8192	0.100708
-0.1453135604	0.3902441222	1651/16384	0.100769
-0.1454441797	0.3903134866	413/4096	0.10083
-0.1455986821	0.3903169172	205/2032	0.100886
-0.1456043638	0.3903365678	1653/16384	0.100891
-0.1456198191	0.3902931272	155/1536	0.100911
-0.145728409	0.3902905135	827/8192	0.100952
-0.1459939754	0.3905496956	1655/16384	0.101013
-0.1457130967	0.3906218271	207/2048	0.101074
-0.1454761315	0.3909222122	1657/16384	0.101135
-0.1456494682	0.3909459531	69/682	0.101173
-0.145617035	0.3910108634	829/8192	0.101196
-0.1457482307	0.3911450888	1659/16384	0.101257
-0.1457737618	0.3912985485	207/2044	0.101272
-0.1454880562	0.3913036696	201/1984	0.10131
-0.145564065	0.3912918063	415/4096	0.101318
-0.1452728151	0.3914006684	1661/16384	0.101379
-0.1450554468	0.3914658232	831/8192	0.10144
-0.1448969378	0.3912937878	69/680	0.101471
-0.1447870372	0.3911809276	1663/16384	0.101501
-0.1450469286	0.3910451993	13/128	0.101562
-0.1450469286	0.3910451993	13/128	0.101562
-0.1453072679	0.3906266547	1665/16384	0.101624
-0.1446866234	0.3904224597	833/8192	0.101685
-0.1447670569	0.3904450317	205/2016	0.101687
-0.1444877804	0.3906556754	1667/16384	0.101746
-0.1440046778	0.3910506876	417/4096	0.101807
-0.1440327358	0.3913223612	1669/16384	0.101868
-0.1439917709	0.3913128788	207/2032	0.10187
-0.144150037	0.3915006871	835/8192	0.101929
-0.1444323931	0.3921508241	1671/16384	0.10199
-0.1442791908	0.3926369874	209/2048	0.102051
-0.1448260536	0.3929953355	1673/16384	0.102112
-0.1448159462	0.3928551758	183/1792	0.102121
-0.1447925849	0.3927211846	19/186	0.102151
-0.1448702342	0.3927301424	837/8192	0.102173
-0.144917994	0.3925953205	157/1536	0.102214
-0.1449375856	0.3925195861	1675/16384	0.102234
-0.1450601039	0.3924148944	209/2044	0.10225
-0.1452151722	0.3925624221	419/4096	0.102295
-0.1451639965	0.3928910008	203/1984	0.102319
-0.1457794842	0.3927021849	1677/16384	0.102356
-0.146334291	0.3922575582	839/8192	0.102417
-0.1466625109	0.3920163445	209/2040	0.102451
-0.1467297664	0.3919526548	1679/16384	0.102478
-0.1469683684	0.3921199666	105/1024	0.102539
-0.1469683684	0.3921199666	105/1024	0.102539
-0.1475021067	0.39185101	1681/16384	0.1026
-0.1475877655	0.39170627	197/1920	0.102604
-0.1469411158	0.3915467904	841/8192	0.102661
-0.1468696148	0.3916047011	23/224	0.102679
-0.1468559001	0.3916685198	1683/16384	0.102722
-0.146773015	0.391608157	421/4096	0.102783
-0.1466743045	0.3915831327	1685/16384	0.102844
-0.1466556404	0.3915964028	209/2032	0.102854
-0.1466027774	0.3916077854	843/8192	0.102905
-0.146427606	0.39147808	1687/16384	0.102966
-0.1466041176	0.3914074586	211/2048	0.103027
-0.1467658942	0.3911975857	1689/16384	0.103088
-0.1466414225	0.39118201	211/2046	0.103128
-0.1466705478	0.3911387856	845/8192	0.103149
-0.1465853204	0.3910370505	1691/16384	0.10321
-0.1465725844	0.3909142307	211/2044	0.103229
-0.1467240354	0.3909565248	423/4096	0.103271
-0.1468942332	0.3908979812	205/1984	0.103327
-0.146903801	0.3909170724	1693/16384	0.103333
-0.1470130105	0.3908890856	847/8192	0.103394
-0.1471343978	0.3909574002	211/2040	0.103431
-0.1471708067	0.3910116913	1695/16384	0.103455
-0.1470326038	0.3911162586	53/512	0.103516
-0.1470326038	0.3911162586	53/512	0.103516
-0.1468650828	0.3914035423	1697/16384	0.103577
-0.1473999607	0.3915790357	849/8192	0.103638
-0.1475877655	0.39170627	199/1920	0.103646
-0.1475309571	0.3914032523	209/2016	0.103671
-0.1474968821	0.3913061782	1699/16384	0.103699
-0.1475168406	0.3906973612	425/4096	0.10376
-0.1473734103	0.3907119231	1701/16384	0.103821
-0.1473619241	0.390741553	211/2032	0.103839
-0.1473086437	0.390740027	851/8192	0.103882
-0.1472031611	0.3906709579	1703/16384	0.103943
-0.1472690547	0.3906070019	213/2048	0.104004
-0.1472037275	0.3904583854	1705/16384	0.104065
-0.1471839146	0.3905281927	71/682	0.104106
-0.147163337	0.390509474	853/8192	0.104126
-0.1471224333	0.3905501679	1707/16384	0.104187
-0.1470861427	0.3905790126	213/2044	0.104207
-0.1470613495	0.3905046456	427/4096	0.104248
-0.1469565178	0.3903953523	1709/16384	0.104309
-0.146902466	0.390437289	207/1984	0.104335
-0.1468494771	0.3902853755	855/8192	0.10437
-0.1469069275	0.3900455647	71/680	0.104412
-0.14704385	0.3900006112	1711/16384	0.104431
-0.1471515196	0.3902086992	107/1024	0.104492
-0.1471515196	0.3902086992	107/1024	0.104492
-0.1474034621	0.3904402424	1713/16384	0.104553
-0.1476462671	0.3898551424	857/8192	0.104614
-0.147446529	0.3898466364	211/2016	0.104663
-0.1474192347	0.3898046321	1715/16384	0.104675
-0.1473647022	0.3897465522	67/640	0.104688
-0.147434182	0.3896205224	429/4096	0.104736
-0.1473520658	0.3893983152	1717/16384	0.104797
-0.1472841435	0.3894162019	161/1536	0.104818
-0.1472823146	0.3894465168	213/2032	0.104823
-0.1471790385	0.3892874708	859/8192	0.104858
-0.1471615873	0.3884976456	1719/16384	0.104919
-0.1477336211	0.3889755508	215/2048	0.10498
-0.1485241836	0.3894299667	1721/16384	0.105042
-0.1485739125	0.3889570673	215/2046	0.105083
-0.1487720425	0.3891409132	861/8192	0.105103
-0.1492918482	0.3888993121	1723/16384	0.105164
-0.1502293675	0.3889895899	215/2044	0.105186
-0.1493645419	0.3895674968	431/4096	0.105225
-0.1491751238	0.3902108491	1725/16384	0.105286
-0.1489517495	0.3905552096	209/1984	0.105343
-0.1490499145	0.3905661003	863/8192	0.105347
-0.1485867629	0.3907575203	43/408	0.105392
-0.1484526703	0.3906604408	1727/16384	0.105408
-0.1484691526	0.3902236598	27/256	0.105469
-0.1484691526	0.3902236598	27/256	0.105469
-0.1478843888	0.3896891351	1729/16384	0.10553
-0.1475896006	0.390431768	865/8192	0.105591
-0.1477364903	0.3906377238	1731/16384	0.105652
-0.1477049073	0.3905941772	71/672	0.105655
-0.14777195	0.3914194979	433/4096	0.105713
-0.1475877655	0.39170627	203/1920	0.105729
-0.1480506758	0.3915597197	1733/16384	0.105774
-0.1481564843	0.3914987475	215/2032	0.105807
-0.148278786	0.3915610543	867/8192	0.105835
-0.1494586682	0.3921025906	1735/16384	0.105896
-0.1500782016	0.3923035439	217/2048	0.105957
-0.1505335982	0.3917617349	1737/16384	0.106018
-0.150234918	0.3917805521	7/66	0.106061
-0.1503169844	0.3916965177	869/8192	0.106079
-0.1502006548	0.3916061315	163/1536	0.10612
-0.1501371542	0.3915598566	1739/16384	0.10614
-0.1499583269	0.3913522214	31/292	0.106164
-0.1503013189	0.3913393363	435/4096	0.106201
-0.150656568	0.3910728197	1741/16384	0.106262
-0.1509305908	0.390890875	871/8192	0.106323
-0.1512398723	0.3910561579	211/1984	0.106351
-0.1514794612	0.391080821	217/2040	0.106373
-0.1513934923	0.3912165147	1743/16384	0.106384
-0.1510843973	0.3914781907	109/1024	0.106445
-0.1510843973	0.3914781907	109/1024	0.106445
-0.150823119	0.3923199233	1745/16384	0.106506
-0.1522455184	0.3918572657	873/8192	0.106567
-0.1521164301	0.3916220477	191/1792	0.106585
-0.1519563819	0.3915647225	1747/16384	0.106628
-0.1519403989	0.3913794552	215/2016	0.106647
-0.1521498826	0.3913624571	437/4096	0.106689
-0.1522352444	0.3910523557	1749/16384	0.10675
-0.1521519845	0.3910284222	41/384	0.106771
-0.1520137596	0.3909865126	217/2032	0.106791
-0.1521241561	0.3908537121	875/8192	0.106812
-0.1523084059	0.3900766612	1751/16384	0.106873
-0.1528659309	0.3907371643	219/2048	0.106934
-0.1540222443	0.3920085933	1753/16384	0.106995
-0.1543669629	0.390809742	73/682	0.107038
-0.1545953653	0.3914614398	877/8192	0.107056
-0.1557960555	0.3909307945	1755/16384	0.107117
-0.1559346194	0.3927221192	439/4096	0.107178
-0.1545034597	0.3942859486	1757/16384	0.107239
-0.1536128693	0.3947852239	879/8192	0.1073
-0.1522977212	0.3941200605	73/680	0.107353
-0.1525815177	0.3939026608	213/1984	0.107359
-0.152540967	0.3940130346	1759/16384	0.107361
-0.1531352296	0.3933281507	55/512	0.107422
-0.1531352296	0.3933281507	55/512	0.107422
-0.152688954	0.3917348056	1761/16384	0.107483
-0.1512110576	0.3925487386	881/8192	0.107544
-0.1513378978	0.3931438372	1763/16384	0.107605
-0.1507735094	0.3948349945	31/288	0.107639
-0.1507214159	0.3950327207	441/4096	0.107666
-0.1511775287	0.3952833161	193/1792	0.107701
-0.1512359829	0.3951949959	1765/16384	0.107727
-0.1516732012	0.3950717084	219/2032	0.107776
-0.1515545086	0.3951882172	883/8192	0.107788
-0.1516988095	0.3954655266	69/640	0.107813
-0.1518320548	0.3957829391	1767/16384	0.107849
-0.1513719752	0.3958050912	221/2048	0.10791
-0.1509213957	0.396504671	1769/16384	0.107971
-0.1513741366	0.3964186187	221/2046	0.108016
-0.1512694767	0.3965110158	885/8192	0.108032
-0.1515899438	0.3966004455	1771/16384	0.108093
-0.152316851	0.3970750179	221/2044	0.108121
-0.1514920113	0.3970618089	443/4096	0.108154
-0.1508112545	0.397649529	1773/16384	0.108215
-0.150154942	0.39793984	887/8192	0.108276
-0.1496016037	0.3969239978	13/120	0.108333
-0.14959519	0.3970557403	1775/16384	0.108337
-0.149918443	0.3966259363	215/1984	0.108367
-0.1501641988	0.3968622433	111/1024	0.108398
-0.1501641988	0.3968622433	111/1024	0.108398
-0.1506651901	0.3958720289	1777/16384	0.108459
-0.1492133646	0.3958043487	889/8192	0.108521
-0.1492717519	0.3962588028	1779/16384	0.108582
-0.1488780031	0.3963118356	73/672	0.108631
-0.1489622029	0.396278037	445/4096	0.108643
-0.1486586017	0.3963856182	1781/16384	0.108704
-0.1486759797	0.3964777188	167/1536	0.108724
-0.1483922654	0.3965983601	221/2032	0.10876
-0.1485076473	0.3965963458	891/8192	0.108765
-0.1478048071	0.3964407104	1783/16384	0.108826
-0.1479644098	0.3958306293	209/1920	0.108854
-0.1481982366	0.3960437441	223/2048	0.108887
-0.1483767257	0.3952517768	1785/16384	0.108948
-0.1479758531	0.395381289	223/2046	0.108993
-0.1480315838	0.3952768647	893/8192	0.109009
-0.147679927	0.3951603314	1787/16384	0.10907
-0.1475215882	0.3947308635	223/2044	0.1091
-0.1478671527	0.3947585419	447/4096	0.109131
-0.1482650093	0.3943563796	1789/16384	0.109192
-0.1485368171	0.39405999	895/8192	0.109253
-0.1492347084	0.3942839053	1791/16384	0.109314
-0.1492415965	0.3942530412	223/2040	0.109314
-0.1489107583	0.3947187787	7/64	0.109375
-0.1489107583	0.3947187787	7/64	0.109375
-0.1487775501	0.3956712347	1793/16384	0.109436
-0.150205963	0.395615837	897/8192	0.109497
-0.1501600351	0.3949821919	1795/16384	0.109558
-0.1507525932	0.3931408485	449/4096	0.109619
-0.1508796446	0.3933962824	221/2016	0.109623
-0.1501984703	0.3930119839	1797/16384	0.10968
-0.1498419287	0.3930496859	899/8192	0.109741
-0.1498936923	0.393160789	223/2032	0.109744
-0.1485122827	0.3923451441	1799/16384	0.109802
-0.1480204213	0.3920680342	225/2048	0.109863
-0.1475877655	0.39170627	211/1920	0.109896
-0.1475010091	0.3922946279	1801/16384	0.109924
-0.1475933516	0.3923604021	197/1792	0.109933
-0.1477226124	0.3924309207	75/682	0.109971
-0.1476397362	0.3924709426	901/8192	0.109985
-0.1477017175	0.3926027412	169/1536	0.110026
-0.1477431027	0.392674735	1803/16384	0.110046
-0.1477559203	0.392934336	225/2044	0.110078
-0.1474749327	0.3928257269	451/4096	0.110107
-0.1468518588	0.3929303326	1805/16384	0.110168
-0.1462629202	0.393547747	903/8192	0.110229
-0.1456147213	0.3939271891	1807/16384	0.110291
-0.145667948	0.393790788	15/136	0.110294
-0.1453452164	0.3935663918	113/1024	0.110352
-0.1453452164	0.3935663918	113/1024	0.110352
-0.1451639965	0.3928910008	219/1984	0.110383
-0.1444845046	0.3934265212	1809/16384	0.110413
-0.1448694679	0.3945318001	905/8192	0.110474
-0.1452185488	0.3943559179	1811/16384	0.110535
-0.145353424	0.3945515533	453/4096	0.110596
-0.1452512657	0.3947567875	223/2016	0.110615
-0.1455625992	0.3946622844	1813/16384	0.110657
-0.1457364422	0.3946241853	907/8192	0.110718
-0.1456806484	0.394730894	225/2032	0.110728
-0.146133329	0.3949177807	1815/16384	0.110779
-0.1457148042	0.3951138477	227/2048	0.11084
-0.1450859684	0.3957222888	1817/16384	0.110901
-0.1455809106	0.3957687907	71/640	0.110937
-0.1456330333	0.3958674866	227/2046	0.110948
-0.1455606315	0.3959590725	909/8192	0.110962
-0.1459833932	0.3962021775	1819/16384	0.111023
-0.1460431334	0.3967919483	227/2044	0.111057
-0.1457244486	0.3967507189	455/4096	0.111084
-0.1454340048	0.3975102701	1821/16384	0.111145
-0.1455342897	0.3979623399	911/8192	0.111206
-0.1452776919	0.3985113898	1823/16384	0.111267
-0.1450275209	0.3984747577	227/2040	0.111275
-0.1447989922	0.3983348955	57/512	0.111328
-0.1447989922	0.3983348955	57/512	0.111328
-0.14378229	0.3988896949	1825/16384	0.111389
-0.1435447156	0.3989999893	221/1984	0.111391
-0.1447200194	0.3998616292	913/8192	0.11145
-0.1452000032	0.3993207625	1827/16384	0.111511
-0.1462429215	0.3991820632	457/4096	0.111572
-0.1461507348	0.3988434398	25/224	0.111607
-0.1460810028	0.3988483485	1829/16384	0.111633
-0.1459801727	0.3986998564	915/8192	0.111694
-0.1460876081	0.3985942435	227/2032	0.111713
-0.1461234315	0.39844895	1831/16384	0.111755
-0.1462610491	0.3985799288	229/2048	0.111816
-0.1465983282	0.3984867581	1833/16384	0.111877
-0.1464374836	0.3983918789	229/2046	0.111926
-0.1464664384	0.3983893932	917/8192	0.111938
-0.1464212629	0.3983246567	43/384	0.111979
-0.1463899648	0.3982938384	1835/16384	0.112
-0.1464223873	0.398114572	229/2044	0.112035
-0.1464995266	0.3981775387	459/4096	0.112061
-0.1467602066	0.398055552	1837/16384	0.112122
-0.1470270582	0.3979451317	919/8192	0.112183
-0.1472688735	0.3984069882	1839/16384	0.112244
-0.147160624	0.3984786384	229/2040	0.112255
-0.1469669045	0.3984330066	115/1024	0.112305
-0.1469669045	0.3984330066	115/1024	0.112305
-0.1465557257	0.3987211953	1841/16384	0.112366
-0.1467534041	0.3988287968	223/1984	0.112399
-0.1471461489	0.3991903435	921/8192	0.112427
-0.147274404	0.3988970477	1843/16384	0.112488
-0.1474558155	0.3989803819	461/4096	0.112549
-0.1476259339	0.399008505	227/2016	0.112599
-0.1476688762	0.3990153361	1845/16384	0.11261
-0.1476893432	0.3989513232	173/1536	0.11263
-0.1478390777	0.3989263003	923/8192	0.112671
-0.1480481815	0.3990190183	229/2032	0.112697
-0.148249049	0.3993356922	1847/16384	0.112732
-0.1478235089	0.3993906506	231/2048	0.112793
-0.1473777913	0.3997003296	1849/16384	0.112854
-0.1476292281	0.3998386117	7/62	0.112903
-0.1475737757	0.3998260506	925/8192	0.112915
-0.1476712668	0.4000257719	1851/16384	0.112976
-0.1474199675	0.4002424741	33/292	0.113014
-0.1473502132	0.4001740208	217/1920	0.113021
-0.1474394432	0.4001074434	463/4096	0.113037
-0.1471583717	0.4001095891	1853/16384	0.113098
-0.1469587926	0.4001421728	927/8192	0.113159
-0.1467648882	0.3998561843	1855/16384	0.11322
-0.146845404	0.3997400502	77/680	0.113235
-0.1470061452	0.3997772299	29/256	0.113281
-0.1470061452	0.3997772299	29/256	0.113281
-0.147394916	0.399403971	1857/16384	0.113342
-0.1467441598	0.3989972846	929/8192	0.113403
-0.1467534041	0.3988287968	225/1984	0.113407
-0.1465708075	0.3993578207	1859/16384	0.113464
-0.1456288407	0.3996399898	465/4096	0.113525
-0.1459391984	0.400062766	1861/16384	0.113586
-0.1459485486	0.4001548787	229/2016	0.113591
-0.1461796521	0.4001750709	931/8192	0.113647
-0.1462561082	0.400499919	231/2032	0.113681
-0.1463901255	0.4006281609	1863/16384	0.113708
-0.1465785339	0.4015937657	233/2048	0.11377
-0.1471301328	0.4012337146	1865/16384	0.113831
-0.1469056734	0.4010958458	233/2046	0.113881
-0.1469435462	0.4011194052	933/8192	0.113892
-0.1469094753	0.4010109177	175/1536	0.113932
-0.1468888093	0.4009524496	1867/16384	0.113953
-0.1470840328	0.4007973619	233/2044	0.113992
-0.1470630414	0.4008968026	467/4096	0.114014
-0.1472429465	0.400899604	73/640	0.114062
-0.1472852656	0.4008963298	1869/16384	0.114075
-0.147439077	0.400880946	935/8192	0.114136
-0.1475518717	0.4010742274	1871/16384	0.114197
-0.1475213467	0.4011690243	233/2040	0.114216
-0.1474056001	0.4011359099	117/1024	0.114258
-0.1474056001	0.4011359099	117/1024	0.114258
-0.1471186809	0.4015286752	1873/16384	0.114319
-0.1478890158	0.4014706271	937/8192	0.11438
-0.147804714	0.4013185477	205/1792	0.114397
-0.1477481229	0.4013138923	227/1984	0.114415
-0.147718666	0.4012726177	1875/16384	0.114441
-0.147819346	0.401198458	469/4096	0.114502
-0.1478704166	0.4010932801	1877/16384	0.114563
-0.1478413857	0.4010779444	11/96	0.114583
-0.1478377555	0.4010133614	939/8192	0.114624
-0.1478696429	0.400882523	233/2032	0.114665
-0.1479400349	0.4008024935	1879/16384	0.114685
-0.1480702123	0.4009864978	235/2048	0.114746
-0.1484239561	0.4013623073	1881/16384	0.114807
-0.1485219278	0.4009953103	235/2046	0.114858
-0.1485234789	0.4010783799	941/8192	0.114868
-0.1487053646	0.4008152556	1883/16384	0.114929
-0.1496286933	0.4010471475	235/2044	0.114971
-0.1490606894	0.4011223591	471/4096	0.11499
-0.1490724176	0.4018159006	1885/16384	0.115051
-0.1487676711	0.4023530937	221/1920	0.115104
-0.1489148281	0.4022756363	943/8192	0.115112
-0.1483048506	0.4022062743	1887/16384	0.115173
-0.148158263	0.401991949	47/408	0.115196
-0.1484043253	0.4018565013	59/512	0.115234
-0.1484043253	0.4018565013	59/512	0.115234
-0.1481052161	0.4012917768	1889/16384	0.115295
-0.1474818551	0.4015979678	945/8192	0.115356
-0.147692286	0.4019909916	1891/16384	0.115417
-0.1475873111	0.4019913419	229/1984	0.115423
-0.1471022322	0.403135078	473/4096	0.115479
-0.1476592873	0.4032131568	207/1792	0.115513
-0.1476835275	0.403093189	1893/16384	0.11554
-0.1478561271	0.4029036062	233/2016	0.115575
-0.14796836	0.4030047715	947/8192	0.115601
-0.1484042592	0.4031926513	235/2032	0.11565
-0.148341325	0.4033513204	1895/16384	0.115662
-0.148027734	0.4035371433	237/2048	0.115723
-0.1478580285	0.4043843972	1897/16384	0.115784
-0.1483084451	0.4040717815	79/682	0.115836
-0.1482193252	0.4041209968	949/8192	0.115845
-0.1485256043	0.404025274	1899/16384	0.115906
-0.149290646	0.4048104475	237/2044	0.115949
-0.1487370539	0.404427825	475/4096	0.115967
-0.1485592577	0.40533325	1901/16384	0.116028
-0.1481649321	0.406218211	951/8192	0.116089
-0.1468564145	0.4053533583	223/1920	0.116146
-0.1468947696	0.4055062189	1903/16384	0.11615
-0.1469826091	0.404831378	79/680	0.116176
-0.1474327793	0.4050495432	119/1024	0.116211
-0.1474327793	0.4050495432	119/1024	0.116211
-0.1475905215	0.4038768198	1905/16384	0.116272
-0.1461786	0.4039302292	953/8192	0.116333
-0.1463700177	0.404597468	1907/16384	0.116394
-0.1459600685	0.4048078949	231/1984	0.116431
-0.1459692048	0.4046341546	477/4096	0.116455
-0.1455895463	0.4047305024	1909/16384	0.116516
-0.145595361	0.4048568081	179/1536	0.116536
-0.1452115203	0.405327376	235/2016	0.116567
-0.1453518521	0.405005375	955/8192	0.116577
-0.1445468397	0.4043438029	237/2032	0.116634
-0.14457865	0.4045574955	1911/16384	0.116638
-0.1450992639	0.4042889217	239/2048	0.116699
-0.1455281266	0.4035565267	1913/16384	0.11676
-0.1450757199	0.4035635412	239/2046	0.116813
-0.145137158	0.4035857794	957/8192	0.116821
-0.1448616194	0.4034166174	1915/16384	0.116882
-0.1450951138	0.4029783146	239/2044	0.116928
-0.1450734506	0.4031240153	479/4096	0.116943
-0.1454197984	0.4029095443	1917/16384	0.117004
-0.1456501219	0.4027184565	959/8192	0.117065
-0.1460748813	0.4029267909	1919/16384	0.117126
-0.1460795742	0.4032439018	239/2040	0.117157
-0.145857597	0.403186801	15/128	0.117188
-0.145857597	0.403186801	15/128	0.117188
-0.1455991803	0.4039712372	1921/16384	0.117249
-0.1469657345	0.4040047644	961/8192	0.11731
-0.1466532652	0.4033344696	1923/16384	0.117371
-0.1473430649	0.402178976	481/4096	0.117432
-0.1475873111	0.4019913419	233/1984	0.11744
-0.1468127524	0.4021700066	1925/16384	0.117493
-0.1465145471	0.4022179765	963/8192	0.117554
-0.146613033	0.4022277192	79/672	0.11756
-0.1460860182	0.4018319482	1927/16384	0.117615
-0.1461827638	0.4018828116	239/2032	0.117618
-0.1458630076	0.4007095884	241/2048	0.117676
-0.1449286366	0.4009400808	1929/16384	0.117737
-0.1451594621	0.4010757988	211/1792	0.117746
-0.1452865411	0.4012850793	241/2046	0.117791
-0.1452427243	0.4012483981	965/8192	0.117798
-0.1452954365	0.4014318725	181/1536	0.117839
-0.1453360009	0.4015273458	1931/16384	0.117859
-0.1450091557	0.4017951532	241/2044	0.117906
-0.1450431619	0.4016669414	483/4096	0.11792
-0.1445938459	0.4017839872	1933/16384	0.117981
-0.144255587	0.4020018205	967/8192	0.118042
-0.1434999169	0.40191072	1935/16384	0.118103
-0.1428212073	0.4016565945	241/2040	0.118137
-0.1427203462	0.401475036	121/1024	0.118164
-0.1427203462	0.401475036	121/1024	0.118164
-0.1417860091	0.4020806127	1937/16384	0.118225
-0.141904869	0.4025577945	227/1920	0.118229
-0.142732936	0.4028692017	969/8192	0.118286
-0.1430301786	0.4024370946	1939/16384	0.118347
-0.1431996868	0.4026042504	485/4096	0.118408
-0.1433253106	0.4027283205	235/1984	0.118448
-0.1433786817	0.4026925981	1941/16384	0.118469
-0.1435325808	0.4026573102	971/8192	0.11853
-0.1435935379	0.4027690508	239/2016	0.118552
-0.1438010656	0.4029283752	1943/16384	0.118591
-0.1437153627	0.4030278121	241/2032	0.118602
-0.1435006463	0.4030182458	243/2048	0.118652
-0.1430447906	0.4033036997	1945/16384	0.118713
-0.1433372376	0.4034628618	81/682	0.118768
-0.1433171983	0.4034322112	973/8192	0.118774
-0.1434562469	0.4036372786	1947/16384	0.118835
-0.1431100445	0.403808177	243/2044	0.118885
-0.1431925131	0.4037680134	487/4096	0.118896
-0.1428968692	0.4037562626	1949/16384	0.118958
-0.1426987718	0.40376903	975/8192	0.119019
-0.1425432161	0.4035317876	1951/16384	0.11908
-0.14270316	0.4033608734	81/680	0.119118
-0.1427368148	0.4034451914	61/512	0.119141
-0.1427368148	0.4034451914	61/512	0.119141
-0.1431422116	0.4030933304	1953/16384	0.119202
-0.142459784	0.4025443433	977/8192	0.119263
-0.141904869	0.4025577945	229/1920	0.119271
-0.1422999922	0.4031642059	1955/16384	0.119324
-0.1414751999	0.4036495414	489/4096	0.119385
-0.142011842	0.4037631653	1957/16384	0.119446
-0.142072317	0.4037642279	237/1984	0.119456
-0.1421798038	0.403788828	979/8192	0.119507
-0.1422615473	0.4039231334	241/2016	0.119544
-0.1422878699	0.403996202	1959/16384	0.119568
-0.1422439591	0.4040821099	243/2032	0.119587
-0.1421374707	0.4040538027	245/2048	0.119629
-0.1420377673	0.4044661108	1961/16384	0.11969
-0.1422417939	0.4042980839	245/2046	0.119746
-0.1422200261	0.4042965466	981/8192	0.119751
-0.142332845	0.4042529538	1963/16384	0.119812
-0.142465128	0.4044305431	35/292	0.119863
-0.1424240039	0.4043760894	491/4096	0.119873
-0.1425102	0.4046366858	1965/16384	0.119934
-0.1426607619	0.4049492731	983/8192	0.119995
-0.1420299082	0.4052390706	1967/16384	0.120056
-0.141915244	0.4047897423	49/408	0.120098
-0.142061491	0.4048514092	123/1024	0.120117
-0.142061491	0.4048514092	123/1024	0.120117
-0.1419549402	0.4042534113	1969/16384	0.120178
-0.140998318	0.4044233732	985/8192	0.120239
-0.1413841028	0.4050081379	1971/16384	0.1203
-0.1413444821	0.4051289934	77/640	0.120313
-0.1411102214	0.4052034672	493/4096	0.120361
-0.1408738557	0.4054840954	1973/16384	0.120422
-0.1409561694	0.4055822282	185/1536	0.120443
-0.1411452441	0.4057102971	239/1984	0.120464
-0.1408769227	0.4058830204	987/8192	0.120483
-0.1397383312	0.406210567	1975/16384	0.120544
-0.1395790255	0.4051367671	245/2032	0.120571
-0.1400725672	0.4054062474	247/2048	0.120605
-0.1403355166	0.4043771921	1977/16384	0.120667
-0.1397558326	0.4044780835	247/2046	0.120723
-0.1397785123	0.404541252	989/8192	0.120728
-0.1393698327	0.4043329733	1979/16384	0.120789
-0.1397704795	0.4039188759	247/2044	0.120841
-0.1396664591	0.4039459196	495/4096	0.12085
-0.1400234955	0.4037289768	1981/16384	0.120911
-0.1402438781	0.4035407327	991/8192	0.120972
-0.1406280165	0.4036816083	1983/16384	0.121033
-0.140546464	0.4040501172	247/2040	0.121078
-0.1404879061	0.4039406038	31/256	0.121094
-0.1404879061	0.4039406038	31/256	0.121094
-0.1403474325	0.404778697	1985/16384	0.121155
-0.1414914614	0.4045005555	993/8192	0.121216
-0.1411336133	0.4039055063	1987/16384	0.121277
-0.1419077893	0.4032566811	497/4096	0.121338
-0.141904869	0.4025577945	233/1920	0.121354
-0.1412359905	0.4030407622	1989/16384	0.121399
-0.1409351557	0.4030560123	995/8192	0.12146
-0.1409984795	0.4029153819	241/1984	0.121472
-0.1405219091	0.4027861178	1991/16384	0.121521
-0.1405991782	0.402674187	35/288	0.121528
-0.1405054032	0.4023662831	247/2032	0.121555
-0.1405777237	0.4016568045	249/2048	0.121582
-0.1396046448	0.4021663274	1993/16384	0.121643
-0.1399363555	0.4024291095	83/682	0.121701
-0.13994858	0.4024122377	997/8192	0.121704
-0.1399785627	0.402542077	187/1536	0.121745
-0.1400039745	0.4026135476	1995/16384	0.121765
-0.1397508927	0.4026885512	249/2044	0.12182
-0.139794622	0.402699451	499/4096	0.121826
-0.139519333	0.4027294047	1997/16384	0.121887
-0.1392909717	0.4027656616	999/8192	0.121948
-0.1391274287	0.4024998265	1999/16384	0.122009
-0.1393453625	0.4023579658	83/680	0.122059
-0.1393149806	0.4024078967	125/1024	0.12207
-0.1393149806	0.4024078967	125/1024	0.12207
-0.1397883453	0.402015558	2001/16384	0.122131
-0.1388557672	0.4016946252	1001/8192	0.122192
-0.1388651969	0.4021175458	219/1792	0.12221
-0.1389458114	0.4022322067	2003/16384	0.122253
-0.1387874666	0.4022902429	501/4096	0.122314
-0.1386838513	0.4024122824	2005/16384	0.122375
-0.1387178041	0.4024471579	47/384	0.122396
-0.1387020634	0.4025537048	1003/8192	0.122437
-0.1386557317	0.4027503251	243/1984	0.12248
-0.1384644933	0.4028759091	2007/16384	0.122498
-0.1380281746	0.402878378	247/2016	0.12252
-0.1381300551	0.4024475968	249/2032	0.122539
-0.1383096021	0.4025090892	251/2048	0.122559
-0.1382680865	0.4017874389	2009/16384	0.12262
-0.1377694966	0.4020832326	251/2046	0.122678
-0.1377794016	0.4021303528	1005/8192	0.122681
-0.1373257335	0.4022383736	2011/16384	0.122742
-0.1374338952	0.4016220165	251/2044	0.122798
-0.1373051984	0.401619041	503/4096	0.122803
-0.1376551622	0.4011294378	2013/16384	0.122864
-0.1379526367	0.4008521326	1007/8192	0.122925
-0.1383938096	0.4010162008	2015/16384	0.122986
-0.1382397673	0.4013873855	251/2040	0.123039
-0.1382702116	0.4013073788	63/512	0.123047
-0.1382702116	0.4013073788	63/512	0.123047
-0.1382412255	0.4020600724	2017/16384	0.123108
-0.1390772115	0.4019235466	1009/8192	0.123169
-0.1389170188	0.4012008407	2019/16384	0.12323
-0.1396164235	0.4006699176	505/4096	0.123291
-0.1389595399	0.4003801913	221/1792	0.123326
-0.1389002291	0.4004569627	2021/16384	0.123352
-0.1386929618	0.4004624838	1011/8192	0.123413
-0.1386044188	0.4003525169	79/640	0.123438
-0.1384813305	0.4002028298	2023/16384	0.123474
-0.1385228089	0.4000899282	245/1984	0.123488
-0.1386455332	0.4000032837	83/672	0.123512
-0.1387268537	0.4000331634	251/2032	0.123524
-0.1386967722	0.4000900956	253/2048	0.123535
-0.1390008619	0.3996245796	2025/16384	0.123596
-0.1385836106	0.3997327027	23/186	0.123656
-0.1385742549	0.3997431653	1013/8192	0.123657
-0.1383917683	0.3997856436	2027/16384	0.123718
-0.1383300873	0.3995443865	253/2044	0.123777
-0.1382814305	0.399536908	507/4096	0.123779
-0.1383058813	0.399073931	2029/16384	0.12384
-0.138448746	0.3986002685	1015/8192	0.123901
-0.1391700374	0.3987244233	2031/16384	0.123962
-0.1389291736	0.3991021311	253/2040	0.12402
-0.1389951114	0.399089625	127/1024	0.124023
-0.1389951114	0.399089625	127/1024	0.124023
-0.1388678894	0.3997480054	2033/16384	0.124084
-0.1397727766	0.3997059256	1017/8192	0.124146
-0.1396719246	0.3990527896	2035/16384	0.124207
-0.1398998481	0.398935616	509/4096	0.124268
-0.1400785704	0.3987479014	2037/16384	0.124329
-0.1400321714	0.3986813542	191/1536	0.124349
-0.1401182435	0.3985028658	1019/8192	0.12439
-0.1407736303	0.3983388459	2039/16384	0.124451
-0.1408610878	0.3988943832	239/1920	0.124479
-0.1406722705	0.3989538377	247/1984	0.124496
-0.1405645357	0.3989109876	251/2016	0.124504
-0.1405382082	0.3988301359	253/2032	0.124508
-0.1406074961	0.3988236437	255/2048	0.124512
-0.1404468957	0.399439635	2041/16384	0.124573
-0.1409465676	0.3993327742	85/682	0.124633
-0.1409488564	0.3993409693	1021/8192	0.124634
-0.1412604226	0.3993583722	2043/16384	0.124695
-0.1412177971	0.3997241953	255/2044	0.124755
-0.1411992153	0.3997202576	511/4096	0.124756
-0.1409989553	0.4000462354	2045/16384	0.124817
-0.1408644758	0.400290103	1023/8192	0.124878
-0.1404549712	0.4002822946	2047/16384	0.124939
-0.1405101096	0.3999913318	1/8	0.125
-0.1405101096	0.3999913318	1/8	0.125
-0.1405601375	0.3994136765	2049/16384	0.125061
-0.1397035023	0.3995017457	1025/8192	0.125122
-0.1398976488	0.4002237105	2051/16384	0.125183
-0.1392567047	0.4008072465	513/4096	0.125244
-0.1400670509	0.4010409141	2053/16384	0.125305
-0.1403382547	0.4009677698	1027/8192	0.125366
-0.1408092667	0.4011412393	2055/16384	0.125427
-0.1408143837	0.4023296207	257/2048	0.125488
-0.1405054032	0.4023662831	255/2032	0.125492
-0.1405991782	0.402674187	253/2016	0.125496
-0.1409984795	0.4029153819	249/1984	0.125504
-0.141904869	0.4025577945	241/1920	0.125521
-0.1419706398	0.4017924887	2057/16384	0.125549
-0.1416590573	0.401646007	225/1792	0.125558
-0.1415572145	0.401469181	1029/8192	0.12561
-0.141551076	0.4014499623	257/2046	0.125611
-0.1414930786	0.4013033392	193/1536	0.125651
-0.1414451893	0.4012186811	2059/16384	0.125671
-0.1416940289	0.4010430924	515/4096	0.125732
-0.1417075202	0.4010075597	257/2044	0.125734
-0.1420902688	0.4008421005	2061/16384	0.125793
-0.1423948847	0.4005554881	1031/8192	0.125854
-0.1432317883	0.4005431056	2063/16384	0.125916
-0.1440748733	0.4010549774	129/1024	0.125977
-0.1440748733	0.4010549774	129/1024	0.125977
-0.1438776168	0.4008403069	257/2040	0.12598
-0.1451184368	0.4005156293	2065/16384	0.126038
-0.1442188748	0.3994567621	1033/8192	0.126099
-0.1437886146	0.3998817418	2067/16384	0.12616
-0.1435656	0.399659456	517/4096	0.126221
-0.1433064033	0.3995553848	2069/16384	0.126282
-0.1431023244	0.3996240156	1035/8192	0.126343
-0.1426584076	0.3993411992	2071/16384	0.126404
-0.1430578995	0.3990887331	259/2048	0.126465
-0.1430049078	0.3992501076	257/2032	0.126476
-0.1432223761	0.3992927995	85/672	0.126488
-0.1435447156	0.3989999893	251/1984	0.126512
-0.1436874868	0.3984236838	2073/16384	0.126526
-0.1431090025	0.3984272652	81/640	0.126562
-0.1430995681	0.3982240371	1037/8192	0.126587
-0.1430673223	0.3982712651	259/2046	0.126588
-0.1426184995	0.3980344743	2075/16384	0.126648
-0.1428048595	0.3973956896	519/4096	0.126709
-0.1426406846	0.3974567843	37/292	0.126712
-0.1430409278	0.3965188436	2077/16384	0.12677
-0.1429171114	0.3959681045	1039/8192	0.126831
-0.1432653317	0.3952944065	2079/16384	0.126892
-0.1438365028	0.3955649848	65/512	0.126953
-0.1438365028	0.3955649848	65/512	0.126953
-0.1434669006	0.3955531967	259/2040	0.126961
-0.1449629155	0.3950909985	2081/16384	0.127014
-0.1442049117	0.3940051425	1041/8192	0.127075
-0.1435118461	0.3942270787	2083/16384	0.127136
-0.1423572244	0.3942288726	521/4096	0.127197
-0.1422929675	0.3947193447	2085/16384	0.127258
-0.1423671218	0.3949561571	1043/8192	0.127319
-0.1421187019	0.395292777	2087/16384	0.12738
-0.1419118426	0.3950712716	261/2048	0.127441
-0.1420554987	0.3948374785	259/2032	0.127461
-0.141576987	0.3947751723	257/2016	0.12748
-0.1414017339	0.3951692396	2089/16384	0.127502
-0.1415529873	0.3952510827	253/1984	0.12752
-0.1415784256	0.3953867362	1045/8192	0.127563
-0.1415927875	0.3953502022	87/682	0.127566
-0.1416542758	0.3954883672	49/384	0.127604
-0.1417064282	0.3955396184	2091/16384	0.127625
-0.1415406355	0.3957441318	523/4096	0.127686
-0.1416287552	0.3957012299	261/2044	0.127691
-0.14119133	0.3960220365	2093/16384	0.127747
-0.1408361994	0.3963129133	1047/8192	0.127808
-0.1401322744	0.3958358639	2095/16384	0.127869
-0.1405980591	0.3954874646	131/1024	0.12793
-0.1405980591	0.3954874646	131/1024	0.12793
-0.1406182738	0.3957234241	87/680	0.127941
-0.1412025962	0.3947251585	2097/16384	0.127991
-0.1394441584	0.3943721767	1049/8192	0.128052
-0.1394840912	0.3951249225	2099/16384	0.128113
-0.1390685932	0.395292607	525/4096	0.128174
-0.1387935934	0.395611754	2101/16384	0.128235
-0.1388679182	0.3957071731	197/1536	0.128255
-0.1387487914	0.3959737382	1051/8192	0.128296
-0.1379140294	0.3963321609	2103/16384	0.128357
-0.1379567211	0.3956267344	263/2048	0.128418
-0.1382462009	0.3952771009	261/2032	0.128445
-0.1376500139	0.3950332279	37/288	0.128472
-0.1375668745	0.394915168	2105/16384	0.128479
-0.1371576957	0.3952984888	255/1984	0.128528
-0.1371716304	0.3951852215	1053/8192	0.12854
-0.1372540185	0.3951429403	263/2046	0.128543
-0.1368132607	0.3953947859	2107/16384	0.128601
-0.1363770337	0.3948683117	247/1920	0.128646
-0.1365714987	0.3949747895	527/4096	0.128662
-0.136738183	0.3950801752	263/2044	0.128669
-0.1363600149	0.3944872953	2109/16384	0.128723
-0.1361369743	0.3941084366	1055/8192	0.128784
-0.1364200808	0.3933906187	2111/16384	0.128845
-0.1369665134	0.3937751568	33/256	0.128906
-0.1369665134	0.3937751568	33/256	0.128906
-0.136695308	0.3941121047	263/2040	0.128922
-0.1380254228	0.3942832556	2113/16384	0.128967
-0.1381922109	0.3920648117	1057/8192	0.129028
-0.1369163525	0.3920013377	2115/16384	0.129089
-0.1357419561	0.3914708623	529/4096	0.12915
-0.1348239883	0.3921499226	2117/16384	0.129211
-0.134913338	0.3929335408	1059/8192	0.129272
-0.13477982	0.3939059782	2119/16384	0.129333
-0.1340740816	0.3940910031	265/2048	0.129395
-0.1336833438	0.3951357405	263/2032	0.129429
-0.1342039782	0.3949703146	2121/16384	0.129456
-0.1343762781	0.3948813955	29/224	0.129464
-0.1345704801	0.3947959279	1061/8192	0.129517
-0.1344955284	0.3948563832	265/2046	0.129521
-0.1346969339	0.3948080221	257/1984	0.129536
-0.1347225621	0.3947246247	199/1536	0.129557
-0.1348142021	0.3946777289	2123/16384	0.129578
-0.1349881041	0.3949377933	531/4096	0.129639
-0.1348357725	0.394893338	265/2044	0.129648
-0.1351177727	0.395187551	83/640	0.129688
-0.1351469643	0.3952597928	2125/16384	0.1297
-0.1352668143	0.3955155135	1063/8192	0.129761
-0.1350778678	0.3958309383	2127/16384	0.129822
-0.1348402629	0.3956926336	133/1024	0.129883
-0.1348402629	0.3956926336	133/1024	0.129883
-0.1348824052	0.3954728302	53/408	0.129902
-0.1342805222	0.3957529818	2129/16384	0.129944
-0.1347091118	0.3963105536	1065/8192	0.130005
-0.1349058935	0.396309122	233/1792	0.130022
-0.1349638773	0.3961815098	2131/16384	0.130066
-0.1351146239	0.3962788191	533/4096	0.130127
-0.1352762437	0.3962776161	2133/16384	0.130188
-0.1353830522	0.3961875634	1067/8192	0.130249
-0.1357405184	0.3962022884	2135/16384	0.13031
-0.1355790177	0.3965066855	267/2048	0.130371
-0.135383656	0.3966822171	265/2032	0.130413
-0.135450894	0.3969112858	2137/16384	0.130432
-0.1356286933	0.3968718985	263/2016	0.130456
-0.1357765143	0.3970292145	1069/8192	0.130493
-0.1357092527	0.3970352929	89/682	0.130499
-0.1360289197	0.3969821467	259/1984	0.130544
-0.1361322709	0.3971062814	2139/16384	0.130554
-0.1359787422	0.3975933308	535/4096	0.130615
-0.1359113836	0.3974349543	267/2044	0.130626
-0.1355523695	0.3979746056	2141/16384	0.130676
-0.1350405844	0.3982010224	251/1920	0.130729
-0.1351756019	0.3981847252	1071/8192	0.130737
-0.1347219763	0.3979066592	2143/16384	0.130798
-0.1349411167	0.3975941516	67/512	0.130859
-0.1349411167	0.3975941516	67/512	0.130859
-0.1351642146	0.3975916817	89/680	0.130882
-0.1350291657	0.3970356927	2145/16384	0.13092
-0.1342642853	0.3970013191	1073/8192	0.130981
-0.1341086894	0.3975954272	2147/16384	0.131042
-0.1337815912	0.3980709883	537/4096	0.131104
-0.1339145215	0.3984946759	235/1792	0.131138
-0.1340230507	0.3984357118	2149/16384	0.131165
-0.1342663164	0.3984931802	1075/8192	0.131226
-0.1344680266	0.3988355638	2151/16384	0.131287
-0.1341935194	0.398947857	269/2048	0.131348
-0.1340326732	0.3991774194	267/2032	0.131398
-0.1340139785	0.3992966123	2153/16384	0.131409
-0.1342899649	0.3992745134	265/2016	0.131448
-0.1343131181	0.3993676638	1077/8192	0.13147
-0.1342756254	0.3994089297	269/2046	0.131476
-0.1345343211	0.3993343458	2155/16384	0.131531
-0.1346887635	0.3992912965	261/1984	0.131552
-0.1346523464	0.3996376464	539/4096	0.131592
-0.1345110022	0.3996303105	269/2044	0.131605
-0.1346262837	0.4001516467	2157/16384	0.131653
-0.1344737029	0.4006941172	1079/8192	0.131714
-0.1336244615	0.4005650858	253/1920	0.131771
-0.1336989903	0.4006169651	2159/16384	0.131775
-0.1338250252	0.4001997216	135/1024	0.131836
-0.1338250252	0.4001997216	135/1024	0.131836
-0.1339873452	0.4000049041	269/2040	0.131863
-0.133693887	0.3996750466	2161/16384	0.131897
-0.133095799	0.3999715365	1081/8192	0.131958
-0.1331274425	0.4003671695	2163/16384	0.132019
-0.1328984621	0.4005442208	541/4096	0.13208
-0.1327685352	0.4007769962	2165/16384	0.132141
-0.1328298755	0.4008341217	203/1536	0.132161
-0.1327969296	0.40104664	1083/8192	0.132202
-0.1322816862	0.4014085173	2167/16384	0.132263
-0.1322005329	0.4009376365	271/2048	0.132324
-0.1319585878	0.4005808666	269/2032	0.132382
-0.1319891932	0.4005392595	2169/16384	0.132385
-0.1315980812	0.4007231394	89/672	0.13244
-0.1316390986	0.4006966517	1085/8192	0.132446
-0.1316343519	0.4005902439	271/2046	0.132454
-0.1313575836	0.4008971544	2171/16384	0.132507
-0.131073849	0.4004487771	263/1984	0.13256
-0.1311015215	0.4005436902	543/4096	0.132568
-0.1313107584	0.4004641481	271/2044	0.132583
-0.130964091	0.4001116638	2173/16384	0.132629
-0.1308349383	0.3997075583	1087/8192	0.13269
-0.1312734808	0.3992641759	2175/16384	0.132751
-0.1315253699	0.3996313003	17/128	0.132812
-0.1315253699	0.3996313003	17/128	0.132812
-0.1315330183	0.3999680407	271/2040	0.132843
-0.1319568087	0.3999497029	2177/16384	0.132874
-0.1323989752	0.3993502018	1089/8192	0.132935
-0.1320199573	0.3987901019	2179/16384	0.132996
-0.1319390679	0.3979335557	545/4096	0.133057
-0.1309729175	0.3976252902	2181/16384	0.133118
-0.130486993	0.3981968485	1091/8192	0.133179
-0.1296530753	0.3988288081	2183/16384	0.13324
-0.1288437314	0.3982814628	273/2048	0.133301
-0.1276017675	0.3991522899	2185/16384	0.133362
-0.1274648808	0.3998566637	271/2032	0.133366
-0.127923001	0.3995366965	239/1792	0.133371
-0.1284977324	0.3997129682	1093/8192	0.133423
-0.1282850832	0.3999707292	91/682	0.133431
-0.1284559601	0.3999428214	269/2016	0.133433
-0.1288360298	0.3997741979	205/1536	0.133464
-0.1290438476	0.3997752507	2187/16384	0.133484
-0.1291879525	0.4003415455	547/4096	0.133545
-0.1287674579	0.4004189149	39/292	0.133562
-0.128976222	0.4005998763	265/1984	0.133569
-0.1293706696	0.4009283327	2189/16384	0.133606
-0.129650161	0.4013746677	1095/8192	0.133667
-0.1295087095	0.4020155319	2191/16384	0.133728
-0.1289543021	0.4019619153	137/1024	0.133789
-0.1289543021	0.4019619153	137/1024	0.133789
-0.1283398371	0.4013305378	91/680	0.133824
-0.1278481328	0.4023110147	2193/16384	0.13385
-0.1276385302	0.401767367	257/1920	0.133854
-0.1293634602	0.4033406829	1097/8192	0.133911
-0.1296978669	0.4027122174	2195/16384	0.133972
-0.1300525914	0.4026327157	549/4096	0.134033
-0.1302377253	0.4024520541	2197/16384	0.134094
-0.1302646745	0.4022278043	1099/8192	0.134155
-0.1306481121	0.4019695452	2199/16384	0.134216
-0.1307342519	0.402340708	275/2048	0.134277
-0.1309036339	0.4026578122	2201/16384	0.134338
-0.1310141254	0.402619381	273/2032	0.13435
-0.1311958865	0.4025258673	1101/8192	0.134399
-0.1312218104	0.4026127238	25/186	0.134409
-0.1312992526	0.4024941259	271/2016	0.134425
-0.1314233695	0.4023668862	2203/16384	0.13446
-0.1315996148	0.4026417866	551/4096	0.134521
-0.1314647612	0.4027208833	275/2044	0.13454
-0.1316969597	0.4028966657	267/1984	0.134577
-0.1316663289	0.4029183414	2205/16384	0.134583
-0.1317437497	0.4031246154	1103/8192	0.134644
-0.1315914899	0.4033703422	2207/16384	0.134705
-0.1314062139	0.403239829	69/512	0.134766
-0.1314062139	0.403239829	69/512	0.134766
-0.1312853776	0.4030551479	55/408	0.134804
-0.1311022864	0.4031234203	2209/16384	0.134827
-0.1309916563	0.4036412979	1105/8192	0.134888
-0.1308343023	0.4034676089	259/1920	0.134896
-0.1314167647	0.4037670323	2211/16384	0.134949
-0.1317493851	0.4039588671	553/4096	0.13501
-0.132000564	0.4037534204	2213/16384	0.135071
-0.1319822691	0.4035764507	1107/8192	0.135132
-0.1321264962	0.403397555	2215/16384	0.135193
-0.1322489602	0.4035010783	277/2048	0.135254
-0.1324578131	0.4035012305	2217/16384	0.135315
-0.1324170158	0.4034199233	275/2032	0.135335
-0.1324042811	0.4033276667	1109/8192	0.135376
-0.1324407371	0.4033099007	277/2046	0.135386
-0.1323601142	0.4032736464	13/96	0.135417
-0.1323232506	0.4032478949	2219/16384	0.135437
-0.1323919948	0.4031152599	555/4096	0.135498
-0.1324709404	0.4031556348	277/2044	0.135519
-0.132539519	0.402953013	2221/16384	0.135559
-0.1324704457	0.4028682322	269/1984	0.135585
-0.1327170349	0.402742022	1111/8192	0.13562
-0.1331184393	0.4029760112	2223/16384	0.135681
-0.1329099818	0.4031539402	139/1024	0.135742
-0.1329099818	0.4031539402	139/1024	0.135742
-0.1327600698	0.4032504788	277/2040	0.135784
-0.1327634849	0.403401918	2225/16384	0.135803
-0.1331210439	0.4035864137	1113/8192	0.135864
-0.1333444453	0.4033720724	2227/16384	0.135925
-0.1334121413	0.4033270271	87/640	0.135937
-0.1335891325	0.4033877933	557/4096	0.135986
-0.1338258096	0.4033063533	2229/16384	0.136047
-0.1338138534	0.4032225954	209/1536	0.136068
-0.1339641959	0.403065163	1115/8192	0.136108
-0.1347598542	0.4030817535	2231/16384	0.136169
-0.1343818837	0.4036069282	279/2048	0.13623
-0.1340897279	0.4040175496	2233/16384	0.136292
-0.1343712501	0.4040760643	277/2032	0.136319
-0.1344092261	0.4043428	1117/8192	0.136353
-0.1343432931	0.404417307	3/22	0.136364
-0.1349252596	0.4046445644	275/2016	0.136409
-0.1347123381	0.4046397789	2235/16384	0.136414
-0.1343296838	0.404922879	559/4096	0.136475
-0.1341912435	0.4048032558	279/2044	0.136497
-0.1339531318	0.4050107531	2237/16384	0.136536
-0.1336482245	0.40507449	271/1984	0.136593
-0.1336783421	0.4051078195	1119/8192	0.136597
-0.1333924082	0.4048624754	2239/16384	0.136658
-0.1335815173	0.4046778522	35/256	0.136719
-0.1335815173	0.4046778522	35/256	0.136719
-0.1337342807	0.4045299731	93/680	0.136765
-0.1337484847	0.4043559655	2241/16384	0.13678
-0.1332683661	0.4042134157	1121/8192	0.136841
-0.1330487855	0.4045340334	2243/16384	0.136902
-0.1326922331	0.4046932851	561/4096	0.136963
-0.1327279634	0.4044182135	263/1920	0.136979
-0.132641429	0.4051439752	2245/16384	0.137024
-0.1329218171	0.4052921039	1123/8192	0.137085
-0.1331716683	0.4056681657	2247/16384	0.137146
-0.1328709842	0.405924459	281/2048	0.137207
-0.1330227647	0.4068227965	2249/16384	0.137268
-0.1333041262	0.4063205983	279/2032	0.137303
-0.1334265718	0.4062869888	1125/8192	0.137329
-0.1335229424	0.4063096893	281/2046	0.137341
-0.1334969655	0.4061419918	211/1536	0.13737
-0.1335179115	0.406051886	2251/16384	0.13739
-0.1335849366	0.4060205415	277/2016	0.137401
-0.1337810178	0.4060771126	563/4096	0.137451
-0.1338287856	0.40621962	281/2044	0.137476
-0.1340725398	0.4061696911	2253/16384	0.137512
-0.1343493949	0.4062188013	1127/8192	0.137573
-0.1344142998	0.4064048389	273/1984	0.137601
-0.1344405312	0.4065695859	2255/16384	0.137634
-0.134203828	0.406615403	141/1024	0.137695
-0.134203828	0.406615403	141/1024	0.137695
-0.1339812036	0.4067075969	281/2040	0.137745
-0.1338874391	0.4067763121	2257/16384	0.137756
-0.1342775649	0.4071518992	1129/8192	0.137817
-0.1346026291	0.4071475893	247/1792	0.137835
-0.1345493086	0.4069356343	2259/16384	0.137878
-0.1347692274	0.4069236246	565/4096	0.137939
-0.1349328962	0.4068123254	2261/16384	0.138
-0.1349032198	0.4067575423	53/384	0.138021
-0.1349485513	0.4066284668	1131/8192	0.138062
-0.1352984804	0.40631259	2263/16384	0.138123
-0.1354082768	0.4067584161	283/2048	0.138184
-0.135396673	0.4072100462	2265/16384	0.138245
-0.1358909331	0.4070490305	281/2032	0.138287
-0.1359341175	0.4072896108	1133/8192	0.138306
-0.135993965	0.4074191036	283/2046	0.138319
-0.1364948249	0.4072263395	2267/16384	0.138367
-0.1364529288	0.4079718035	567/4096	0.138428
-0.1361111719	0.4080728038	283/2044	0.138454
-0.1359572079	0.4084577381	2269/16384	0.138489
-0.1355670029	0.4087525003	1135/8192	0.13855
-0.1351172885	0.4084560173	275/1984	0.138609
-0.1351142656	0.4084883747	2271/16384	0.138611
-0.1352853753	0.4082055332	71/512	0.138672
-0.1352853753	0.4082055332	71/512	0.138672
-0.1353109605	0.407896892	283/2040	0.138725
-0.1353727398	0.407777819	2273/16384	0.138733
-0.1347917443	0.407772988	1137/8192	0.138794
-0.1346279813	0.408205405	2275/16384	0.138855
-0.1343094804	0.4084877651	569/4096	0.138916
-0.134207947	0.4090672093	249/1792	0.138951
-0.1343726549	0.4089513506	2277/16384	0.138977
-0.1346607854	0.4090282086	1139/8192	0.139038
-0.1347219053	0.4091814118	89/640	0.139063
-0.1348560886	0.4093989539	2279/16384	0.139099
-0.1345815531	0.4095013518	285/2048	0.13916
-0.1343284704	0.4097526253	2281/16384	0.139221
-0.1347006969	0.4098970711	283/2032	0.139272
-0.1346569622	0.4099371081	1141/8192	0.139282
-0.1346987545	0.4100322935	95/682	0.139296
-0.134898128	0.4099063735	2283/16384	0.139343
-0.1353785727	0.4102662194	281/2016	0.139385
-0.1350283471	0.4102133398	571/4096	0.139404
-0.1348351084	0.4104129545	285/2044	0.139432
-0.1349410525	0.4107071606	2285/16384	0.139465
-0.1347855168	0.4112613561	1143/8192	0.139526
-0.1340272828	0.4110988583	2287/16384	0.139587
-0.1340122306	0.4107482615	277/1984	0.139617
-0.1342043261	0.4107410187	143/1024	0.139648
-0.1342043261	0.4107410187	143/1024	0.139648
-0.1341876749	0.4103531298	19/136	0.139706
-0.1342513226	0.4103363466	2289/16384	0.139709
-0.1337041327	0.4103359176	1145/8192	0.139771
-0.1335363223	0.410716218	2291/16384	0.139832
-0.133242619	0.4108493177	573/4096	0.139893
-0.1330238891	0.4110500178	2293/16384	0.139954
-0.1330766795	0.4111393554	215/1536	0.139974
-0.1330025372	0.4113765927	1147/8192	0.140015
-0.1322631205	0.4116173881	2295/16384	0.140076
-0.1321298744	0.4110350155	269/1920	0.140104
-0.1323841169	0.411075464	287/2048	0.140137
-0.1324517887	0.4106600078	2297/16384	0.140198
-0.1320113208	0.4105239553	285/2032	0.140256
-0.1320238834	0.4105474789	1149/8192	0.140259
-0.1319817786	0.4103982054	287/2046	0.140274
-0.1316493497	0.4105496852	2299/16384	0.14032
-0.1317135726	0.410113321	283/2016	0.140377
-0.1316662888	0.4101164327	575/4096	0.140381
-0.1319217266	0.410042681	41/292	0.140411
-0.1318600584	0.4097861057	2301/16384	0.140442
-0.1319941176	0.4094907912	1151/8192	0.140503
-0.1323985432	0.4094898632	2303/16384	0.140564
-0.1323698173	0.4097537775	9/64	0.140625
-0.1323698173	0.4097537775	9/64	0.140625
-0.1324053247	0.4100633042	2305/16384	0.140686
-0.1324123723	0.4100688554	287/2040	0.140686
-0.132857781	0.409960516	1153/8192	0.140747
-0.1328890617	0.4095568635	2307/16384	0.140808
-0.133095628	0.4092035197	577/4096	0.140869
-0.1328814843	0.4087461777	2309/16384	0.14093
-0.132518819	0.4088045503	1155/8192	0.140991
-0.1320272028	0.408615546	2311/16384	0.141052
-0.1321684626	0.4081687678	289/2048	0.141113
-0.1326105677	0.4081937082	271/1920	0.141146
-0.1316774051	0.4071639787	2313/16384	0.141174
-0.1312180555	0.4076126656	253/1792	0.141183
-0.1312884894	0.4080779872	1157/8192	0.141235
-0.1312840738	0.4079742218	287/2032	0.14124
-0.1310833279	0.4081396854	289/2046	0.141251
-0.1313052221	0.4083313764	217/1536	0.141276
-0.1313603765	0.4084647814	2315/16384	0.141296
-0.1310216657	0.4087018471	579/4096	0.141357
-0.1310420247	0.4085794386	95/672	0.141369
-0.1307239422	0.4085303778	289/2044	0.141389
-0.1305926686	0.4089515103	2317/16384	0.141418
-0.1302678272	0.4093446352	1159/8192	0.141479
-0.1295450677	0.4092965768	2319/16384	0.141541
-0.1296197128	0.4087198317	145/1024	0.141602
-0.1296197128	0.4087198317	145/1024	0.141602
-0.1299845701	0.4085810067	281/1984	0.141633
-0.1297323925	0.4078124019	2321/16384	0.141663
-0.1299972182	0.4079234157	17/120	0.141667
-0.1278654034	0.4084813573	1161/8192	0.141724
-0.1285489028	0.4094873155	2323/16384	0.141785
-0.1286750621	0.4101505942	581/4096	0.141846
-0.1290514606	0.4104589131	2325/16384	0.141907
-0.1294515739	0.4103692962	1163/8192	0.141968
-0.1300705524	0.4107453325	2327/16384	0.142029
-0.1296321809	0.4111633553	291/2048	0.14209
-0.1292252372	0.4116151018	2329/16384	0.142151
-0.1296985528	0.4118481723	91/640	0.142187
-0.1297820216	0.4120890859	1165/8192	0.142212
-0.1297612068	0.4122577628	289/2032	0.142224
-0.1297930775	0.4124097977	97/682	0.142229
-0.1303615718	0.4121941878	2331/16384	0.142273
-0.1303190505	0.4128866054	583/4096	0.142334
-0.1299949556	0.413014591	41/288	0.142361
-0.1297715286	0.4130548327	291/2044	0.142368
-0.1300084686	0.4134907275	2333/16384	0.142395
-0.1298677351	0.4141436022	1167/8192	0.142456
-0.1289578212	0.414383412	2335/16384	0.142517
-0.1289107557	0.413723066	73/512	0.142578
-0.1289107557	0.413723066	73/512	0.142578
-0.1288333772	0.4130358462	2337/16384	0.142639
-0.1288800379	0.41308951	283/1984	0.142641
-0.1288932873	0.4127527399	97/680	0.142647
-0.1276268289	0.41315094	1169/8192	0.1427
-0.1274892711	0.4144431285	2339/16384	0.142761
-0.1270737421	0.4159902508	585/4096	0.142822
-0.1286264252	0.4173733184	2341/16384	0.142883
-0.1295604189	0.4161867812	1171/8192	0.142944
-0.1306866743	0.4156572674	2343/16384	0.143005
-0.1311912225	0.4162440795	293/2048	0.143066
-0.1321748542	0.4163722263	2345/16384	0.143127
-0.1319153056	0.4154734366	1173/8192	0.143188
-0.131985704	0.4151941079	293/2046	0.143206
-0.1319212245	0.4152598232	291/2032	0.143209
-0.1317213966	0.4152564638	55/384	0.143229
-0.131565468	0.4151758882	2347/16384	0.14325
-0.1317659258	0.414721578	587/4096	0.143311
-0.1322379344	0.4146794361	293/2044	0.143346
-0.1320915872	0.4145682983	289/2016	0.143353
-0.1321820584	0.4143175726	2349/16384	0.143372
-0.1325437763	0.4137899454	1175/8192	0.143433
-0.133367558	0.4141347592	2351/16384	0.143494
-0.1330740895	0.4145458862	147/1024	0.143555
-0.1330740895	0.4145458862	147/1024	0.143555
-0.1328530628	0.4150334111	2353/16384	0.143616
-0.1329412642	0.4152997662	293/2040	0.143627
-0.1332960724	0.4151548356	285/1984	0.143649
-0.1336658596	0.4152600795	1177/8192	0.143677
-0.1339883648	0.41469391	2355/16384	0.143738
-0.1343970807	0.4144651105	589/4096	0.143799
-0.1346447794	0.4141601084	2357/16384	0.14386
-0.1345585239	0.414059498	221/1536	0.14388
-0.1345976686	0.4137712823	1179/8192	0.143921
-0.1353377629	0.4133854278	2359/16384	0.143982
-0.1353324851	0.4139532554	295/2048	0.144043
-0.135358605	0.4144175906	2361/16384	0.144104
-0.1358765376	0.4143691701	1181/8192	0.144165
-0.1360350857	0.414447635	295/2046	0.144184
-0.1360601359	0.4143317194	293/2032	0.144193
-0.13620135	0.41419653	2363/16384	0.144226
-0.1365087699	0.4146289563	277/1920	0.144271
-0.136398828	0.4145352133	591/4096	0.144287
-0.1362896993	0.4148242004	295/2044	0.144325
-0.1364614542	0.4149373422	97/672	0.144345
-0.1364364428	0.4149234582	2365/16384	0.144348
-0.1365706416	0.4152544228	1183/8192	0.144409
-0.136190689	0.4156050948	2367/16384	0.14447
-0.1360230972	0.4153058514	37/256	0.144531
-0.1360230972	0.4153058514	37/256	0.144531
-0.1358324011	0.4149837288	2369/16384	0.144592
-0.1356223198	0.4150142013	59/408	0.144608
-0.1353324343	0.4153232277	1185/8192	0.144653
-0.1354042669	0.41529075	287/1984	0.144657
-0.1355097161	0.4159070897	2371/16384	0.144714
-0.1355042204	0.4166379451	593/4096	0.144775
-0.1365341374	0.4173223763	2373/16384	0.144836
-0.136873171	0.4164663069	1187/8192	0.144897
-0.13747584	0.4158664853	2375/16384	0.144958
-0.1380176139	0.4162034137	297/2048	0.14502
-0.139192096	0.4164506115	2377/16384	0.145081
-0.1382973292	0.4150324774	1189/8192	0.145142
-0.1380669967	0.414924479	9/62	0.145161
-0.1379639188	0.4150433132	295/2032	0.145177
-0.1379956799	0.4150882754	223/1536	0.145182
-0.1378616251	0.4151462921	2379/16384	0.145203
-0.1376932533	0.4148206006	595/4096	0.145264
-0.137743653	0.414537005	297/2044	0.145303
-0.137654082	0.4145431134	93/640	0.145313
-0.1376205136	0.4144657081	2381/16384	0.145325
-0.1375555177	0.4144154013	293/2016	0.145337
-0.1374891453	0.414217137	1191/8192	0.145386
-0.1376895453	0.4139619862	2383/16384	0.145447
-0.1378537309	0.4140944821	149/1024	0.145508
-0.1378537309	0.4140944821	149/1024	0.145508
-0.1381318034	0.4142606183	2385/16384	0.145569
-0.1382154519	0.4140256864	99/680	0.145588
-0.1381883988	0.4137330456	1193/8192	0.14563
-0.1387109729	0.4135904545	261/1792	0.145647
-0.1379243687	0.4136001191	289/1984	0.145665
-0.1378621745	0.4136717544	2387/16384	0.145691
-0.1377045873	0.413556031	597/4096	0.145752
-0.1375451221	0.4135344091	2389/16384	0.145813
-0.1374475153	0.4136367627	1195/8192	0.145874
-0.1371291391	0.4136111824	2391/16384	0.145935
-0.137271041	0.4133708617	299/2048	0.145996
-0.1374634357	0.4131785613	2393/16384	0.146057
-0.1372059622	0.4129171907	1197/8192	0.146118
-0.1371734064	0.4127879271	299/2046	0.146139
-0.1370439087	0.4128612808	297/2032	0.146161
-0.1368869479	0.4128150529	2395/16384	0.146179
-0.1370475296	0.4123926652	599/4096	0.14624
-0.1373672162	0.412366113	299/2044	0.146282
-0.1374944609	0.4121946652	2397/16384	0.146301
-0.1375460675	0.4117908807	295/2016	0.146329
-0.1379628339	0.4121179135	281/1920	0.146354
-0.1378649068	0.4120827216	1199/8192	0.146362
-0.1380961442	0.4124498838	2399/16384	0.146423
-0.1378667088	0.412564737	75/512	0.146484
-0.1378667088	0.412564737	75/512	0.146484
-0.1376364682	0.412759418	2401/16384	0.146545
-0.1377622761	0.4128573648	299/2040	0.146569
-0.1379436132	0.413033907	1201/8192	0.146606
-0.13827601	0.4128814916	2403/16384	0.146667
-0.138325857	0.4129324075	291/1984	0.146673
-0.1386361445	0.412879686	601/4096	0.146729
-0.1387109729	0.4135904545	263/1792	0.146763
-0.1389446897	0.4124660934	2405/16384	0.14679
-0.1387032446	0.4122478069	1203/8192	0.146851
-0.1386983867	0.4118267148	2407/16384	0.146912
-0.1389907338	0.4118591374	301/2048	0.146973
-0.1393731299	0.411779276	2409/16384	0.147034
-0.1391280691	0.4114050057	1205/8192	0.147095
-0.1390879905	0.4113050485	301/2046	0.147116
-0.1389318946	0.4113986375	299/2032	0.147146
-0.1388777225	0.4113355466	2411/16384	0.147156
-0.1388729468	0.4109841298	603/4096	0.147217
-0.1391083138	0.4107710929	43/292	0.14726
-0.1391982595	0.410480612	2413/16384	0.147278
-0.1396515803	0.4098955859	1207/8192	0.147339
-0.1404804786	0.4107591522	283/1920	0.147396
-0.1404774888	0.4106401627	2415/16384	0.1474
-0.1399932336	0.4108792431	151/1024	0.147461
-0.1399932336	0.4108792431	151/1024	0.147461
-0.139624441	0.4112394554	2417/16384	0.147522
-0.13992335	0.4113432001	301/2040	0.147549
-0.1401156509	0.4116755014	1209/8192	0.147583
-0.1406343942	0.411480998	2419/16384	0.147644
-0.1410687235	0.4114481518	293/1984	0.147681
-0.1410157292	0.4116034295	605/4096	0.147705
-0.1413918665	0.4116432737	2421/16384	0.147766
-0.1414300245	0.4115175134	227/1536	0.147786
-0.1417080491	0.4114232949	1211/8192	0.147827
-0.1423569003	0.4120696925	2423/16384	0.147888
-0.1417783418	0.4121893108	303/2048	0.147949
-0.1413120195	0.4123172079	2425/16384	0.14801
-0.141483695	0.4128013987	1213/8192	0.148071
-0.1414843886	0.4129424793	101/682	0.148094
-0.1416889758	0.4131380559	301/2032	0.14813
-0.1416851705	0.4130830568	2427/16384	0.148132
-0.1413668567	0.4132817411	607/4096	0.148193
-0.141099851	0.4132458541	303/2044	0.148239
-0.1409981074	0.4132932676	2429/16384	0.148254
-0.1407365392	0.4133398578	299/2016	0.148313
-0.140720801	0.4133613631	1215/8192	0.148315
-0.1405045742	0.4130460538	2431/16384	0.148376
-0.1407333821	0.4129397833	19/128	0.148438
-0.1407333821	0.4129397833	19/128	0.148438
-0.1410230709	0.4127862449	2433/16384	0.148499
-0.1408097655	0.412611665	101/680	0.148529
-0.1406857613	0.4123848316	1217/8192	0.14856
-0.1402831769	0.4125987735	2435/16384	0.148621
-0.1399014082	0.4126572226	609/4096	0.148682
-0.1400068185	0.4126448539	295/1984	0.14869
-0.1396237214	0.4131294823	2437/16384	0.148743
-0.1399221284	0.4133303851	1219/8192	0.148804
-0.1400590102	0.4137841145	2439/16384	0.148865
-0.1396871375	0.4138782011	305/2048	0.148926
-0.1390606844	0.4140136389	2441/16384	0.148987
-0.1387109729	0.4135904545	267/1792	0.148996
-0.1400234632	0.4147424175	1221/8192	0.149048
-0.1402744228	0.4146670286	305/2046	0.149071
-0.1402353073	0.4145120536	229/1536	0.149089
-0.1402901068	0.4143844834	2443/16384	0.149109
-0.1403259918	0.4144431415	303/2032	0.149114
-0.1406548818	0.4144750858	611/4096	0.14917
-0.1409501718	0.4146948044	305/2044	0.149217
-0.1410852005	0.4146571073	2445/16384	0.149231
-0.1414985508	0.4146347233	1223/8192	0.149292
-0.1414215134	0.4147967637	43/288	0.149306
-0.1418097804	0.4151704347	2447/16384	0.149353
-0.1413738575	0.4153211928	153/1024	0.149414
-0.1413738575	0.4153211928	153/1024	0.149414
-0.1407577211	0.415424859	2449/16384	0.149475
-0.140800176	0.4152854755	287/1920	0.149479
-0.1409101965	0.4161521788	61/408	0.14951
-0.1412118731	0.4165471848	1225/8192	0.149536
-0.1423526693	0.4161779395	2451/16384	0.149597
-0.1431424375	0.415263531	613/4096	0.149658
-0.1430871331	0.4147688699	297/1984	0.149698
-0.1429145641	0.4147806147	2453/16384	0.149719
-0.1426128153	0.4146711219	1227/8192	0.14978
-0.1425105914	0.4141091239	2455/16384	0.149841
-0.1429371068	0.4141886508	307/2048	0.149902
-0.1433837249	0.4142997541	2457/16384	0.149963
-0.1434144835	0.4137523155	1229/8192	0.150024
-0.1434399396	0.4136012232	307/2046	0.150049
-0.1432964677	0.413421647	2459/16384	0.150085
-0.1433401646	0.4132606603	305/2032	0.150098
-0.143668526	0.4133213208	615/4096	0.150146
-0.1439510622	0.4134128913	307/2044	0.150196
-0.1440293262	0.4134342318	2461/16384	0.150208
-0.1442949585	0.4134475263	1231/8192	0.150269
-0.1443577979	0.4136534595	101/672	0.150298
-0.1444256193	0.4137891155	2463/16384	0.15033
-0.1441749197	0.4138368407	77/512	0.150391
-0.1441749197	0.4138368407	77/512	0.150391
-0.1438360077	0.4138845887	2465/16384	0.150452
-0.1440398169	0.4142603455	307/2040	0.15049
-0.1440320514	0.4144378064	1233/8192	0.150513
-0.1439094084	0.4143468796	289/1920	0.150521
-0.1445817825	0.4143209603	2467/16384	0.150574
-0.1450223293	0.4142661206	617/4096	0.150635
-0.1453338457	0.4136342976	2469/16384	0.150696
-0.1451734827	0.4136069065	299/1984	0.150706
-0.1449880874	0.4135620696	1235/8192	0.150757
-0.1448686123	0.4132331876	2471/16384	0.150818
-0.1450765202	0.4131704693	309/2048	0.150879
-0.1453246304	0.4129803475	2473/16384	0.15094
-0.1449959733	0.4128338071	1237/8192	0.151001
-0.1449161478	0.412823984	103/682	0.151026
-0.1448406596	0.4128895318	2475/16384	0.151062
-0.1447329342	0.4129057242	307/2032	0.151083
-0.1447283542	0.4127317915	619/4096	0.151123
-0.1446693579	0.4125032165	309/2044	0.151174
-0.1446697507	0.4124037899	2477/16384	0.151184
-0.1445090326	0.4120200756	1239/8192	0.151245
-0.1450038683	0.4114417098	305/2016	0.15129
-0.1452651093	0.4117704604	2479/16384	0.151306
-0.1451773457	0.4121894548	155/1024	0.151367
-0.1451773457	0.4121894548	155/1024	0.151367
-0.1451375656	0.4125711175	2481/16384	0.151428
-0.1455729604	0.4124500972	103/680	0.151471
-0.1456720876	0.4126311092	1241/8192	0.151489
-0.1459688621	0.4121559714	2483/16384	0.15155
-0.1460516099	0.4120068572	97/640	0.151562
-0.1463252728	0.4119244231	621/4096	0.151611
-0.1466417775	0.4116058035	2485/16384	0.151672
-0.1465405542	0.4114812769	233/1536	0.151693
-0.1463248456	0.4113252431	301/1984	0.151714
-0.1466284165	0.4111456525	1243/8192	0.151733
-0.1479666596	0.4108477593	2487/16384	0.151794
-0.1474997759	0.4117121255	311/2048	0.151855
-0.1470667284	0.4122708448	2489/16384	0.151917
-0.14767497	0.4127547355	1245/8192	0.151978
-0.1478530904	0.4129125731	311/2046	0.152004
-0.1481210735	0.4130170679	2491/16384	0.152039
-0.1479656852	0.413721036	309/2032	0.152067
-0.14777164	0.4134080669	623/4096	0.1521
-0.1473895141	0.4135879835	311/2044	0.152153
-0.1473183035	0.4135544567	2493/16384	0.152161
-0.1470570191	0.4137324902	1247/8192	0.152222
-0.1467199364	0.413479487	307/2016	0.152282
-0.1467006807	0.4134817421	2495/16384	0.152283
-0.1469069708	0.4132756219	39/256	0.152344
-0.1469069708	0.4132756219	39/256	0.152344
-0.1472053342	0.412980902	2497/16384	0.152405
-0.1466256438	0.4128797371	311/2040	0.152451
-0.1466004257	0.4126792597	1249/8192	0.152466
-0.1462648879	0.4131073284	2499/16384	0.152527
-0.1459470351	0.4133293377	625/4096	0.152588
-0.1459967158	0.4131435989	293/1920	0.152604
-0.1457833366	0.4140161338	2501/16384	0.152649
-0.1462157758	0.4140166292	1251/8192	0.15271
-0.1461007863	0.4141174307	303/1984	0.152722
-0.1465478597	0.4143971779	2503/16384	0.152771
-0.1462427935	0.4146188455	313/2048	0.152832
-0.1457733817	0.4149560722	2505/16384	0.152893
-0.1470494056	0.4154435104	1253/8192	0.152954
-0.14707467	0.4150938594	313/2046	0.152981
-0.1470136234	0.4150346264	235/1536	0.152995
-0.1469983631	0.4148938574	2507/16384	0.153015
-0.1472835829	0.4146601538	311/2032	0.153051
-0.1473457827	0.414822661	627/4096	0.153076
-0.1477169215	0.4148089158	313/2044	0.153131
-0.1477454226	0.4148493017	2509/16384	0.153137
-0.1480312293	0.4147815081	1255/8192	0.153198
-0.1482169177	0.415116486	2511/16384	0.153259
-0.1481418516	0.4152231645	103/672	0.153274
-0.1479954616	0.4152043228	157/1024	0.15332
-0.1479954616	0.4152043228	157/1024	0.15332
-0.1476687266	0.4153504177	2513/16384	0.153381
-0.1481444628	0.4156843315	313/2040	0.153431
-0.1480902269	0.4157404445	1257/8192	0.153442
-0.1479679601	0.4160695532	275/1792	0.15346
-0.1484220917	0.4154912632	2515/16384	0.153503
-0.1486417963	0.415374074	629/4096	0.153564
-0.1487690045	0.4152040838	2517/16384	0.153625
-0.1487143122	0.4151648022	59/384	0.153646
-0.148707758	0.415046315	1259/8192	0.153687
-0.148765342	0.4148233869	305/1984	0.15373
-0.1489553212	0.4146752635	2519/16384	0.153748
-0.1491183858	0.4150475828	315/2048	0.153809
-0.1490749457	0.4154242638	2521/16384	0.15387
-0.1496464982	0.415505221	1261/8192	0.153931
-0.1499071572	0.4154939273	105/682	0.153959
-0.150105522	0.4153596018	2523/16384	0.153992
-0.1501813032	0.4162878218	313/2032	0.154035
-0.1501769034	0.4159368449	631/4096	0.154053
-0.1497821171	0.4164668297	45/292	0.15411
-0.1497597604	0.4163992131	2525/16384	0.154114
-0.1494949836	0.4167030456	1263/8192	0.154175
-0.1490742801	0.4164669784	2527/16384	0.154236
-0.1490853134	0.4162129283	311/2016	0.154266
-0.1492467012	0.416238362	79/512	0.154297
-0.1492467012	0.416238362	79/512	0.154297
-0.1494440837	0.4159038667	2529/16384	0.154358
-0.1488523939	0.4158491262	21/136	0.154412
-0.1489070437	0.4157859293	1265/8192	0.154419
-0.148645792	0.4161358343	2531/16384	0.15448
-0.1483610834	0.4163605591	633/4096	0.154541
-0.1479679601	0.4160695532	277/1792	0.154576
-0.1481107149	0.4171018598	2533/16384	0.154602
-0.1486096579	0.4169960703	1267/8192	0.154663
-0.1486952585	0.4171901236	99/640	0.154688
-0.1488860182	0.4173573765	2535/16384	0.154724
-0.1488174197	0.4174876799	307/1984	0.154738
-0.1486404462	0.4174952238	317/2048	0.154785
-0.1483749922	0.4177324513	2537/16384	0.154846
-0.1487790922	0.4179296774	1269/8192	0.154907
-0.1489370478	0.4179297338	317/2046	0.154936
-0.1489985855	0.4178382945	2539/16384	0.154968
-0.1491827328	0.4181990051	315/2032	0.15502
-0.1491693706	0.4180768109	635/4096	0.155029
-0.1491026549	0.4186447626	317/2044	0.155088
-0.149098454	0.4185887321	2541/16384	0.15509
-0.1490307984	0.4191366869	1271/8192	0.155151
-0.1482550397	0.4189329328	2543/16384	0.155212
-0.1484431828	0.4185107347	313/2016	0.155258
-0.1484789852	0.4186195479	159/1024	0.155273
-0.1484789852	0.4186195479	159/1024	0.155273
-0.1486457025	0.4182593594	2545/16384	0.155334
-0.1480890107	0.4180980933	317/2040	0.155392
-0.1481238439	0.4181132407	1273/8192	0.155396
-0.1478121995	0.4184433693	2547/16384	0.155457
-0.1474996658	0.4185915114	637/4096	0.155518
-0.1472542226	0.4187799266	2549/16384	0.155579
-0.1473122506	0.4188727227	239/1536	0.155599
-0.14724054	0.4190728195	1275/8192	0.15564
-0.1465171045	0.4191674267	2551/16384	0.155701
-0.1465582079	0.4186178096	299/1920	0.155729
-0.1467406774	0.4186171298	309/1984	0.155746
-0.1467524202	0.418732707	319/2048	0.155762
-0.1469866263	0.4184174118	2553/16384	0.155823
-0.1465858584	0.4181506862	1277/8192	0.155884
-0.1464364492	0.4180432298	29/186	0.155914
-0.1462686932	0.4180904736	2555/16384	0.155945
-0.1463625246	0.4177890528	317/2032	0.156004
-0.1463671101	0.4177622399	639/4096	0.156006
-0.1466431277	0.4175581098	319/2044	0.156067
-0.1466448129	0.4175535105	2557/16384	0.156067
-0.1468039899	0.4173521773	1279/8192	0.156128
-0.1471259582	0.4174926842	2559/16384	0.156189
-0.1469958912	0.4176714369	5/32	0.15625
-0.1469958912	0.4176714369	5/32	0.15625
-0.1468306291	0.4178928924	2561/16384	0.156311
-0.1472344717	0.4180701755	1281/8192	0.156372
-0.1472403845	0.4180818183	319/2040	0.156373
-0.1474925556	0.4177743833	2563/16384	0.156433
-0.1477604763	0.4175587387	641/4096	0.156494
-0.1479776886	0.4168326214	2565/16384	0.156555
-0.1474753433	0.4169756878	1283/8192	0.156616
-0.1471061558	0.416684534	2567/16384	0.156677
-0.1473385954	0.4164325788	321/2048	0.156738
-0.147333972	0.4165771925	311/1984	0.156754
-0.1475523863	0.4165941515	301/1920	0.156771
-0.1476836244	0.4160844379	2569/16384	0.156799
-0.1479679601	0.4160695532	281/1792	0.156808
-0.1464700063	0.4157348559	1285/8192	0.15686
-0.1464638234	0.4161189045	107/682	0.156891
-0.1465503375	0.4161633789	241/1536	0.156901
-0.1465919842	0.4163038068	2571/16384	0.156921
-0.1462535914	0.416459425	643/4096	0.156982
-0.1463206047	0.4164848682	319/2032	0.156988
-0.1458169801	0.4165674751	2573/16384	0.157043
-0.1458436482	0.4165529315	321/2044	0.157045
-0.1455310024	0.4168051234	1287/8192	0.157104
-0.1450399178	0.4165246012	2575/16384	0.157166
-0.145312429	0.4162386874	161/1024	0.157227
-0.145312429	0.4162386874	161/1024	0.157227
-0.1453223214	0.41640129	317/2016	0.157242
-0.1457114466	0.4159205897	2577/16384	0.157288
-0.1450423736	0.415362505	1289/8192	0.157349
-0.1451098688	0.4155083431	107/680	0.157353
-0.1443016787	0.4158600417	2579/16384	0.15741
-0.1437536537	0.416900508	645/4096	0.157471
-0.1441852362	0.4173582488	2581/16384	0.157532
-0.1445494857	0.4173147821	1291/8192	0.157593
-0.1449642321	0.4177927743	2583/16384	0.157654
-0.1445021598	0.417982936	323/2048	0.157715
-0.1440869948	0.4179245406	313/1984	0.157762
-0.1439439584	0.4181175263	2585/16384	0.157776
-0.144267712	0.4186053487	101/640	0.157812
-0.1442881482	0.4188204501	1293/8192	0.157837
-0.1444440394	0.4190863967	323/2046	0.157869
-0.1447409845	0.4190538152	2587/16384	0.157898
-0.1445001319	0.4195641025	647/4096	0.157959
-0.1444667073	0.4193809789	321/2032	0.157972
-0.1439396763	0.419883941	2589/16384	0.15802
-0.1438953652	0.419801486	323/2044	0.158023
-0.1435590084	0.4203003925	1295/8192	0.158081
-0.1428272847	0.419894106	2591/16384	0.158142
-0.1432082495	0.4195222379	81/512	0.158203
-0.1432082495	0.4195222379	81/512	0.158203
-0.1435137272	0.4196390777	319/2016	0.158234
-0.1436531575	0.4191482906	2593/16384	0.158264
-0.1429737471	0.4184622971	1297/8192	0.158325
-0.1432063521	0.418519569	19/120	0.158333
-0.1420829013	0.4189390546	2595/16384	0.158386
-0.1410136474	0.4192553512	649/4096	0.158447
-0.1400125617	0.420984402	2597/16384	0.158508
-0.1417309006	0.4213768043	1299/8192	0.158569
-0.1431155605	0.4220419913	2599/16384	0.15863
-0.1430366711	0.4230982861	325/2048	0.158691
-0.1442755599	0.4245990904	2601/16384	0.158752
-0.1447285333	0.4234871349	315/1984	0.15877
-0.1446454045	0.4227916221	1301/8192	0.158813
-0.1446666974	0.422338627	325/2046	0.158847
-0.1445018453	0.4223981845	61/384	0.158854
-0.1443699068	0.4222432807	2603/16384	0.158875
-0.1448043208	0.4218864491	651/4096	0.158936
-0.1448630892	0.4221585352	323/2032	0.158957
-0.1455090351	0.4217167131	2605/16384	0.158997
-0.1456054712	0.4217996131	325/2044	0.159002
-0.1460602612	0.4212905481	1303/8192	0.159058
-0.1468299586	0.4220577017	2607/16384	0.159119
-0.1462606738	0.4223411648	163/1024	0.15918
-0.1462606738	0.4223411648	163/1024	0.15918
-0.1458033388	0.4223299938	107/672	0.159226
-0.145602015	0.4226170528	2609/16384	0.159241
-0.1463175355	0.4236958129	1305/8192	0.159302
-0.1459411363	0.424118745	65/408	0.159314
-0.1473192208	0.4232158255	2611/16384	0.159363
-0.1480868226	0.4229560231	653/4096	0.159424
-0.1485476251	0.4225393936	2613/16384	0.159485
-0.1484157024	0.4223815521	245/1536	0.159505
-0.1484889496	0.4220321622	1307/8192	0.159546
-0.1495373558	0.4216345022	2615/16384	0.159607
-0.1493973069	0.4223918998	327/2048	0.159668
-0.1491417655	0.4230301631	2617/16384	0.159729
-0.1500959982	0.4231473487	317/1984	0.159778
-0.1500499934	0.4232775085	1309/8192	0.15979
-0.1505018205	0.4233011699	109/682	0.159824
-0.1506132112	0.4230701516	2619/16384	0.159851
-0.1509020957	0.4238724035	307/1920	0.159896
-0.1508071226	0.4236537035	655/4096	0.159912
-0.150410902	0.4237943892	325/2032	0.159941
-0.1505646429	0.4243166074	2621/16384	0.159973
-0.1504524894	0.4244643524	327/2044	0.15998
-0.1505826	0.424886506	1311/8192	0.160034
-0.1497511338	0.4250348639	2623/16384	0.160095
-0.1498210618	0.4245230336	41/256	0.160156
-0.1498210618	0.4245230336	41/256	0.160156
-0.1499602911	0.4239583427	2625/16384	0.160217
-0.149927029	0.4239749322	323/2016	0.160218
-0.1490136142	0.4238791481	1313/8192	0.160278
-0.1488796447	0.4235810679	109/680	0.160294
-0.1486058293	0.4246907379	2627/16384	0.160339
-0.1479538909	0.4256527858	657/4096	0.1604
-0.148253291	0.4275969516	2629/16384	0.160461
-0.1497731612	0.4268204462	1315/8192	0.160522
-0.1512321632	0.4265618835	2631/16384	0.160583
-0.1515690858	0.4274029336	329/2048	0.160645
-0.1523630963	0.4283583976	2633/16384	0.160706
-0.1531709002	0.4268858526	1317/8192	0.160767
-0.1534776278	0.4261535438	319/1984	0.160786
-0.152875376	0.4260348245	329/2046	0.160802
-0.1528433059	0.4262883969	247/1536	0.160807
-0.1525862285	0.4261654327	2635/16384	0.160828
-0.1528282218	0.4253805854	659/4096	0.160889
-0.1539446518	0.4249647517	327/2032	0.160925
-0.1532842329	0.4246153975	103/640	0.160938
-0.1532222581	0.4243825435	2637/16384	0.16095
-0.1532615533	0.4240912052	47/292	0.160959
-0.1530206668	0.423733165	1319/8192	0.161011
-0.1537247545	0.423228115	2639/16384	0.161072
-0.1539961495	0.4237358508	165/1024	0.161133
-0.1539961495	0.4237358508	165/1024	0.161133
-0.1543235126	0.4245805664	2641/16384	0.161194
-0.1550025768	0.4248048103	325/2016	0.16121
-0.1554306819	0.4235163142	1321/8192	0.161255
-0.1561359449	0.423695924	289/1792	0.161272
-0.1562291303	0.423308998	329/2040	0.161275
-0.1547430414	0.4223813941	2643/16384	0.161316
-0.1538773009	0.4219096082	661/4096	0.161377
-0.1533350346	0.4219618258	2645/16384	0.161438
-0.153175661	0.4222794544	1323/8192	0.161499
-0.1524381509	0.422256529	2647/16384	0.16156
-0.1527138245	0.4217481071	331/2048	0.161621
-0.1531731402	0.4213385777	2649/16384	0.161682
-0.1524343489	0.4207691177	1325/8192	0.161743
-0.1520217101	0.4206398805	331/2046	0.161779
-0.152008516	0.4209138653	321/1984	0.161794
-0.1518319882	0.4207843888	2651/16384	0.161804
-0.1518621629	0.4201068546	663/4096	0.161865
-0.1523087995	0.4198748351	329/2032	0.161909
-0.1524552499	0.4195670197	2653/16384	0.161926
-0.1525341035	0.4194195953	331/2044	0.161937
-0.1529313834	0.4191113351	311/1920	0.161979
-0.1527794592	0.4191318782	1327/8192	0.161987
-0.1534477908	0.4194130728	2655/16384	0.162048
-0.1531781084	0.4197978384	83/512	0.162109
-0.1531781084	0.4197978384	83/512	0.162109
-0.1527852166	0.4202520446	2657/16384	0.16217
-0.1531576941	0.4204888646	109/672	0.162202
-0.1536422353	0.4207602282	1329/8192	0.162231
-0.1538721991	0.4211925535	331/2040	0.162255
-0.1544635873	0.4200176388	2659/16384	0.162292
-0.154779823	0.4191362636	665/4096	0.162354
-0.1554944156	0.4188387498	291/1792	0.162388
-0.1547468695	0.4183771614	2661/16384	0.162415
-0.1539080404	0.4183697172	1331/8192	0.162476
-0.1533371791	0.418109093	2663/16384	0.162537
-0.1535219992	0.4178402335	333/2048	0.162598
-0.1536519832	0.4174865836	2665/16384	0.162659
-0.1531859948	0.4174915675	1333/8192	0.16272
-0.1530449017	0.4175814357	111/682	0.162757
-0.1530226376	0.4176612513	2667/16384	0.162781
-0.1528929988	0.4177681365	323/1984	0.162802
-0.1527901557	0.4174940156	667/4096	0.162842
-0.1526664788	0.4171488878	331/2032	0.162894
-0.1527213045	0.4170102005	2669/16384	0.162903
-0.1526244523	0.4169182352	333/2044	0.162916
-0.1526661447	0.4165643384	1335/8192	0.162964
-0.1533436453	0.4165834108	313/1920	0.163021
-0.1532952918	0.4165396011	2671/16384	0.163025
-0.1532124654	0.416841084	167/1024	0.163086
-0.1532124654	0.416841084	167/1024	0.163086
-0.1531753562	0.4171972598	2673/16384	0.163147
-0.153611915	0.4170645745	47/288	0.163194
-0.1536747759	0.4171337299	1337/8192	0.163208
-0.153897339	0.4170709419	111/680	0.163235
-0.153807329	0.4167371283	2675/16384	0.163269
-0.1539233538	0.4164905205	669/4096	0.16333
-0.153977401	0.4162768106	2677/16384	0.163391
-0.1539095492	0.4162552295	251/1536	0.163411
-0.1538770445	0.4161301951	1339/8192	0.163452
-0.1541736679	0.4158249558	2679/16384	0.163513
-0.1542408485	0.416111234	335/2048	0.163574
-0.1542501833	0.4163906399	2681/16384	0.163635
-0.1546269818	0.4163147306	1341/8192	0.163696
-0.1547525252	0.4162210954	335/2046	0.163734
-0.1547932681	0.4161577692	2683/16384	0.163757
-0.1549326819	0.4164093345	325/1984	0.16381
-0.1549471666	0.4163542927	671/4096	0.163818
-0.1549400766	0.4166730014	333/2032	0.163878
-0.154944055	0.4166617469	2685/16384	0.163879
-0.1550119724	0.4167373948	335/2044	0.163894
-0.1549973145	0.4168801674	1343/8192	0.16394
-0.1546777569	0.4170102985	2687/16384	0.164001
-0.1546607002	0.4167997018	21/128	0.164062
-0.1546607002	0.4167997018	21/128	0.164062
-0.154649031	0.4165419103	2689/16384	0.164124
-0.1542683286	0.4166490228	1345/8192	0.164185
-0.1542753851	0.4166772729	331/2016	0.164187
-0.1540817459	0.4167269218	67/408	0.164216
-0.1542077194	0.4170150701	2691/16384	0.164246
-0.1541436239	0.417335137	673/4096	0.164307
-0.1541090546	0.4177746186	2693/16384	0.164368
-0.1547638279	0.4177092264	1347/8192	0.164429
-0.1553318352	0.417583799	2695/16384	0.16449
-0.1554072332	0.4179624183	337/2048	0.164551
-0.1555553522	0.4185302733	2697/16384	0.164612
-0.1554944156	0.4188387498	295/1792	0.164621
-0.156245241	0.4179655949	1349/8192	0.164673
-0.1562123313	0.4174996853	337/2046	0.164712
-0.1562283212	0.4175641334	253/1536	0.164714
-0.1560737356	0.4174306562	2699/16384	0.164734
-0.1561277178	0.4168808763	675/4096	0.164795
-0.1565141974	0.4167877514	327/1984	0.164819
-0.1561145906	0.4163614407	2701/16384	0.164856
-0.1561374214	0.4162782881	335/2032	0.164862
-0.1559820296	0.4162664971	337/2044	0.164873
-0.1559732296	0.4160923574	1351/8192	0.164917
-0.1563008199	0.415788409	2703/16384	0.164978
-0.1564435716	0.416039769	169/1024	0.165039
-0.1564435716	0.416039769	169/1024	0.165039
-0.1566328222	0.4164099155	2705/16384	0.1651
-0.1565463531	0.4164243019	317/1920	0.165104
-0.1570671554	0.4159258662	1353/8192	0.165161
-0.157316302	0.4160166328	37/224	0.165179
-0.1573403707	0.4156036464	337/2040	0.165196
-0.15681834	0.4154367609	2707/16384	0.165222
-0.156609669	0.415115282	677/4096	0.165283
-0.1563094059	0.4147963288	2709/16384	0.165344
-0.1559010639	0.4151177446	1355/8192	0.165405
-0.1553770614	0.4154037958	2711/16384	0.165466
-0.1552681644	0.4150578113	339/2048	0.165527
-0.1551160705	0.4147288631	2713/16384	0.165588
-0.1548012043	0.4149713894	1357/8192	0.165649
-0.1547231045	0.415079701	113/682	0.165689
-0.1546921214	0.4151403197	2715/16384	0.16571
-0.154540744	0.4150054513	679/4096	0.165771
-0.1544675117	0.414817434	329/1984	0.165827
-0.1544836082	0.4148012148	2717/16384	0.165833
-0.1544322461	0.4147821097	337/2032	0.165846
-0.1544202556	0.4147878582	339/2044	0.165851
-0.154405639	0.4146957016	1359/8192	0.165894
-0.1545153873	0.4145283156	2719/16384	0.165955
-0.1546111069	0.4146319662	85/512	0.166016
-0.1546111069	0.4146319662	85/512	0.166016
-0.1547192954	0.4147986616	2721/16384	0.166077
-0.1549468781	0.414524724	1361/8192	0.166138
-0.154943691	0.4146027037	319/1920	0.166146
-0.1551024826	0.4143695578	335/2016	0.166171
-0.1550416199	0.4142213001	113/680	0.166176
-0.154725863	0.4142673032	2723/16384	0.166199
-0.1545526639	0.4141159652	681/4096	0.16626
-0.1543121864	0.4139697575	2725/16384	0.166321
-0.1542044235	0.4143525818	1363/8192	0.166382
-0.1541319627	0.4145379176	2727/16384	0.166443
-0.1540357483	0.4144887378	341/2048	0.166504
-0.1538866659	0.4144625662	2729/16384	0.166565
-0.1539502916	0.4146378816	1365/8192	0.166626
-0.1539961804	0.4146619645	1/6	0.166667
-0.1540211488	0.4146653503	2731/16384	0.166687
-0.1540067162	0.4147484717	683/4096	0.166748
-0.1539073364	0.4148652573	2733/16384	0.166809
-0.1539316861	0.4149236781	341/2044	0.16683
-0.15393526	0.4149156443	339/2032	0.166831
-0.1539649263	0.4149149148	331/1984	0.166835
-0.1538385085	0.4150135537	1367/8192	0.16687
-0.1535677617	0.4148586645	2735/16384	0.166931
-0.153715045	0.4147706076	171/1024	0.166992
-0.153715045	0.4147706076	171/1024	0.166992
-0.1538552781	0.4146848775	2737/16384	0.167053
-0.153720389	0.4144834399	1369/8192	0.167114
-0.1535410943	0.4144140055	341/2040	0.167157
-0.1535046975	0.4144805612	337/2016	0.167163
-0.1534520273	0.4145188357	2739/16384	0.167175
-0.1533680464	0.4145600583	107/640	0.167187
-0.1532476248	0.4145328629	685/4096	0.167236
-0.1530487666	0.4145958534	2741/16384	0.167297
-0.153070448	0.4146653353	257/1536	0.167318
-0.1529893138	0.4147778493	1371/8192	0.167358
-0.1523837037	0.4147617568	2743/16384	0.167419
-0.1527080829	0.4144090507	343/2048	0.16748
-0.1530364273	0.414261088	2745/16384	0.167542
-0.1528669306	0.413820135	1373/8192	0.167603
-0.152764388	0.4136598303	343/2046	0.167644
-0.1526745456	0.4135448121	2747/16384	0.167664
-0.1530098589	0.4134220576	687/4096	0.167725
-0.1533355514	0.4135262818	2749/16384	0.167786
-0.153397937	0.4134411109	49/292	0.167808
-0.1534713562	0.4134134902	341/2032	0.167815
-0.1535365357	0.4135794181	333/1984	0.167843
-0.1535440495	0.4135446251	1375/8192	0.167847
-0.1535939693	0.4138313882	2751/16384	0.167908
-0.1534104656	0.413826936	43/256	0.167969
-0.1534104656	0.413826936	43/256	0.167969
-0.1531464274	0.4138269609	2753/16384	0.16803
-0.1532939416	0.4141995104	1377/8192	0.168091
-0.1535038366	0.4142782519	343/2040	0.168137
-0.1536049199	0.4141893898	2755/16384	0.168152
-0.1535770919	0.414219902	113/672	0.168155
-0.1538047315	0.4142159566	689/4096	0.168213
-0.1537213584	0.4142552911	323/1920	0.168229
-0.1540279938	0.4142653213	2757/16384	0.168274
-0.154075007	0.4138547433	1379/8192	0.168335
-0.1541314831	0.4135163875	2759/16384	0.168396
-0.1543499716	0.4136080894	345/2048	0.168457
-0.1546169511	0.4137534366	2761/16384	0.168518
-0.1547415702	0.4132985235	1381/8192	0.168579
-0.1546998409	0.4130349964	259/1536	0.16862
-0.1546720658	0.4130467191	115/682	0.168622
-0.1543438489	0.4129323121	2763/16384	0.16864
-0.1539868541	0.4127479421	691/4096	0.168701
-0.1537076283	0.4125097105	2765/16384	0.168762
-0.1536045099	0.412594487	345/2044	0.168787
-0.153460852	0.4125734713	343/2032	0.168799
-0.1534848816	0.4124107021	1383/8192	0.168823
-0.1535191557	0.4122076905	335/1984	0.168851
-0.1535446242	0.412066321	2767/16384	0.168884
-0.1537525618	0.4121459954	173/1024	0.168945
-0.1537525618	0.4121459954	173/1024	0.168945
-0.1540566446	0.4122723837	2769/16384	0.169006
-0.1540793783	0.4117371572	1385/8192	0.169067
-0.1543303448	0.4117020358	303/1792	0.169085
-0.1537115792	0.4116589023	23/136	0.169118
-0.1536213371	0.4116383379	2771/16384	0.169128
-0.1534774805	0.4117094348	341/2016	0.169147
-0.1533819834	0.4116100531	693/4096	0.169189
-0.153177646	0.4116707808	2773/16384	0.16925
-0.1531994397	0.4117317637	65/384	0.169271
-0.153135265	0.411823964	1387/8192	0.169312
-0.1527264537	0.4119886337	2775/16384	0.169373
-0.1528036809	0.4115737142	347/2048	0.169434
-0.1531251148	0.4112750022	2777/16384	0.169495
-0.152586302	0.4107434057	1389/8192	0.169556
-0.1522835986	0.4106678638	347/2046	0.169599
-0.1519654985	0.410579872	2779/16384	0.169617
-0.152358335	0.4098115671	695/4096	0.169678
-0.1533876588	0.4096727225	2781/16384	0.169739
-0.153475388	0.4090369449	347/2044	0.169765
-0.1543768481	0.409646727	345/2032	0.169783
-0.1540089837	0.4097172301	1391/8192	0.1698
-0.154039456	0.410464127	337/1984	0.169859
-0.1540862921	0.4104549476	2783/16384	0.169861
-0.1536637478	0.4104453977	87/512	0.169922
-0.1536637478	0.4104453977	87/512	0.169922
-0.1530814764	0.4105684247	2785/16384	0.169983
-0.1534874322	0.4111848132	1393/8192	0.170044
-0.1539546951	0.4111448951	347/2040	0.170098
-0.154059919	0.4111966163	2787/16384	0.170105
-0.1543789904	0.4111516061	49/288	0.170139
-0.1544171415	0.4113175424	697/4096	0.170166
-0.1543303448	0.4117020358	305/1792	0.170201
-0.1548245934	0.4115211904	2789/16384	0.170227
-0.1551031323	0.4106243127	1395/8192	0.170288
-0.1552483477	0.4103646331	109/640	0.170313
-0.1553309813	0.4100687409	2791/16384	0.170349
-0.1556119109	0.4103062029	349/2048	0.17041
-0.1559836571	0.4105735029	2793/16384	0.170471
-0.1561055568	0.4099596795	1397/8192	0.170532
-0.1559775859	0.4098195997	349/2046	0.170577
-0.1559264098	0.4097153969	2795/16384	0.170593
-0.1562192301	0.4094411402	699/4096	0.170654
-0.1570150496	0.4095014338	2797/16384	0.170715
-0.1575689377	0.4088547074	349/2044	0.170744
-0.1578068404	0.4100450574	347/2032	0.170768
-0.1576882073	0.4096764719	1399/8192	0.170776
-0.1573433035	0.4106310699	2799/16384	0.170837
-0.1568927501	0.4105650037	339/1984	0.170867
-0.1569542579	0.4103199097	175/1024	0.170898
-0.1569542579	0.4103199097	175/1024	0.170898
-0.1564307569	0.4100754391	2801/16384	0.170959
-0.1562934543	0.410798211	1401/8192	0.171021
-0.1568209767	0.4112228877	349/2040	0.171078
-0.1567721188	0.4112371652	2803/16384	0.171082
-0.157041981	0.4115458425	115/672	0.171131
-0.1569925471	0.4114986288	701/4096	0.171143
-0.157210718	0.4117235085	2805/16384	0.171204
-0.1572878556	0.4116585895	263/1536	0.171224
-0.1574651667	0.4117259204	1403/8192	0.171265
-0.1575521352	0.4124057561	2807/16384	0.171326
-0.1570236279	0.4123663021	329/1920	0.171354
-0.1571458357	0.4121737121	351/2048	0.171387
-0.1568166508	0.4119113957	2809/16384	0.171448
-0.1565672931	0.4123911059	1405/8192	0.171509
-0.1565728678	0.4125828125	117/682	0.171554
-0.1565525333	0.4126758806	2811/16384	0.17157
-0.1562571017	0.4126195043	703/4096	0.171631
-0.1560000552	0.4123737119	2813/16384	0.171692
-0.15584998	0.4124378941	351/2044	0.171722
-0.1557937197	0.4122835348	349/2032	0.171752
-0.1557876657	0.4122638	1407/8192	0.171753
-0.1558719775	0.4118859717	2815/16384	0.171814
-0.1560966022	0.4120148334	11/64	0.171875
-0.1560966022	0.4120148334	11/64	0.171875
-0.1563685005	0.4122154464	2817/16384	0.171936
-0.1565737912	0.411708166	1409/8192	0.171997
-0.1561358604	0.4113395706	2819/16384	0.172058
-0.1561236984	0.4113682761	117/680	0.172059
-0.1558302641	0.4111215002	705/4096	0.172119
-0.1557838021	0.4111811524	347/2016	0.172123
-0.1554521332	0.4108380254	2821/16384	0.17218
-0.1551536604	0.4116774057	1411/8192	0.172241
-0.1550527518	0.4121401902	2823/16384	0.172302
-0.1547750304	0.4120155157	353/2048	0.172363
-0.1548399573	0.4117782485	331/1920	0.172396
-0.1544054704	0.411859462	2825/16384	0.172424
-0.1543303448	0.4117020358	309/1792	0.172433
-0.1543412521	0.4124146552	1413/8192	0.172485
-0.1544053086	0.4126879171	265/1536	0.172526
-0.1544340473	0.4126664414	353/2046	0.172532
-0.1547726754	0.4127931326	2827/16384	0.172546
-0.1551190065	0.4130149462	707/4096	0.172607
-0.1553580832	0.4133018574	2829/16384	0.172668
-0.1555057946	0.4132628548	353/2044	0.172701
-0.1555639024	0.4134396733	1415/8192	0.172729
-0.1555148317	0.4133779004	351/2032	0.172736
-0.155418188	0.4137856206	2831/16384	0.172791
-0.1552365588	0.4136433551	177/1024	0.172852
-0.1552365588	0.4136433551	177/1024	0.172852
-0.1552940346	0.4134810541	343/1984	0.172883
-0.1549876912	0.4134569919	2833/16384	0.172913
-0.154847264	0.4138914273	1417/8192	0.172974
-0.15512727	0.4141543246	2835/16384	0.173035
-0.1550416199	0.4142213001	353/2040	0.173039
-0.1553080862	0.414360722	709/4096	0.173096
-0.1551024826	0.4143695578	349/2016	0.173115
-0.1555687542	0.4146026127	2837/16384	0.173157
-0.1559190201	0.4142751442	1419/8192	0.173218
-0.1563931716	0.413841416	2839/16384	0.173279
-0.1566293486	0.4142208289	355/2048	0.17334
-0.1568772119	0.4146438064	2841/16384	0.173401
-0.1572105342	0.4142656075	111/640	0.173437
-0.1573305683	0.4142167865	1421/8192	0.173462
-0.1573977241	0.4139849716	355/2046	0.173509
-0.157435	0.4138951961	2843/16384	0.173523
-0.1577680689	0.4140544791	711/4096	0.173584
-0.1579581711	0.4144599598	2845/16384	0.173645
-0.1581539768	0.4145338097	355/2044	0.173679
-0.158137902	0.4146845662	1423/8192	0.173706
-0.1579685406	0.4146553664	353/2032	0.17372
-0.1578589307	0.4150230224	2847/16384	0.173767
-0.1576989763	0.4147936716	89/512	0.173828
-0.1576989763	0.4147936716	89/512	0.173828
-0.1575037416	0.4144741506	2849/16384	0.173889
-0.1575302229	0.4145047137	345/1984	0.173891
-0.1571112731	0.4149239073	1425/8192	0.17395
-0.1573596629	0.4154017155	2851/16384	0.174011
-0.1573403707	0.4156036464	71/408	0.17402
-0.1575739427	0.4157254034	713/4096	0.174072
-0.157316302	0.4160166328	39/224	0.174107
-0.1578403861	0.4160685484	2853/16384	0.174133
-0.1584121128	0.41564777	1427/8192	0.174194
-0.1587854431	0.4152197633	2855/16384	0.174255
-0.1589983926	0.4154660208	357/2048	0.174316
-0.1593159202	0.4157921976	2857/16384	0.174377
-0.15952905	0.4151156096	1429/8192	0.174438
-0.1593735131	0.4149466505	67/384	0.174479
-0.1593279798	0.4149433797	119/682	0.174487
-0.1592795885	0.4149086552	2859/16384	0.1745
-0.1593960099	0.4145637233	715/4096	0.174561
-0.1597465926	0.413739513	2861/16384	0.174622
-0.1592888375	0.413416367	51/292	0.174658
-0.1594388669	0.4131100844	1431/8192	0.174683
-0.1599019549	0.4129424308	355/2032	0.174705
-0.160241052	0.4123570699	2863/16384	0.174744
-0.1605754609	0.4129096811	179/1024	0.174805
-0.1605754609	0.4129096811	179/1024	0.174805
-0.1613150083	0.4134736748	2865/16384	0.174866
-0.1616183004	0.4127254422	347/1984	0.174899
-0.1615958022	0.4124874142	1433/8192	0.174927
-0.1611509264	0.4117443731	2867/16384	0.174988
-0.1609296277	0.411632482	7/40	0.175
-0.1608931398	0.4113972373	717/4096	0.175049
-0.1607170865	0.4111353473	353/2016	0.175099
-0.1606639976	0.4110823557	2869/16384	0.17511
-0.1605615039	0.4111499868	269/1536	0.17513
-0.1603637297	0.4110410624	1435/8192	0.175171
-0.1603670934	0.4101773343	2871/16384	0.175232
-0.1608360456	0.4105582187	359/2048	0.175293
-0.1611716965	0.4109706885	2873/16384	0.175354
-0.1616298966	0.4104148125	1437/8192	0.175415
-0.1616181411	0.4101306814	359/2046	0.175464
-0.1617066597	0.4100713695	2875/16384	0.175476
-0.1622097704	0.4102563491	337/1920	0.175521
-0.1620500149	0.4102045401	719/4096	0.175537
-0.162334973	0.4105958487	2877/16384	0.175598
-0.1627102443	0.4106567535	359/2044	0.175636
-0.1625811995	0.4107920102	1439/8192	0.175659
-0.1623889895	0.4110777853	357/2032	0.175689
-0.162327198	0.4112684687	2879/16384	0.17572
-0.1620908036	0.4110108949	45/256	0.175781
-0.1620908036	0.4110108949	45/256	0.175781
-0.1618167346	0.410647481	2881/16384	0.175842
-0.1613909502	0.4112276903	1441/8192	0.175903
-0.1614607485	0.4111980539	349/1984	0.175907
-0.161769705	0.4118923554	2883/16384	0.175964
-0.1620345206	0.4119841791	359/2040	0.17598
-0.1620997555	0.4121848579	721/4096	0.176025
-0.162435686	0.4124982502	2885/16384	0.176086
-0.1623782548	0.4125891997	355/2016	0.176091
-0.1632755616	0.411904368	1443/8192	0.176147
-0.1635425154	0.4112733542	2887/16384	0.176208
-0.1638275443	0.4115394833	361/2048	0.17627
-0.1641684791	0.4118694142	2889/16384	0.176331
-0.164448517	0.4112065917	1445/8192	0.176392
-0.1643601222	0.4109705929	271/1536	0.176432
-0.1642364338	0.4109574993	361/2046	0.176442
-0.1642692003	0.410869735	2891/16384	0.176453
-0.1637006372	0.409546732	723/4096	0.176514
-0.1632649174	0.4093249278	113/640	0.176563
-0.1631865647	0.4093107473	2893/16384	0.176575
-0.1628210472	0.4093908629	361/2044	0.176614
-0.1629189402	0.4092305344	1447/8192	0.176636
-0.1629128005	0.4089252526	359/2032	0.176673
-0.1629350008	0.4088245349	2895/16384	0.176697
-0.1631939357	0.408883859	181/1024	0.176758
-0.1631939357	0.408883859	181/1024	0.176758
-0.1635952102	0.4089984871	2897/16384	0.176819
-0.1635120218	0.4083268441	1449/8192	0.17688
-0.1637143238	0.4082486668	317/1792	0.176897
-0.1634296526	0.4079842432	351/1984	0.176915
-0.162836505	0.4082986499	2899/16384	0.176941
-0.1627585709	0.4084718557	361/2040	0.176961
-0.1626242366	0.4084061368	725/4096	0.177002
-0.1624641444	0.4085380141	2901/16384	0.177063
-0.1625041193	0.4085799736	17/96	0.177083
-0.1624740917	0.4086709292	1451/8192	0.177124
-0.16216415	0.4088790288	2903/16384	0.177185
-0.1621549502	0.4085461721	363/2048	0.177246
-0.162355556	0.4082266576	2905/16384	0.177307
-0.161670062	0.4079931345	1453/8192	0.177368
-0.1614176188	0.4082349117	11/62	0.177419
-0.1612451087	0.4081950939	2907/16384	0.177429
-0.1610400576	0.4075935495	727/4096	0.17749
-0.1616438085	0.4067334653	2909/16384	0.177551
-0.1619103991	0.4053578764	363/2044	0.177593
-0.1624192585	0.4063176278	341/1920	0.177604
-0.1621615718	0.4062577886	1455/8192	0.177612
-0.1629109192	0.4067274305	361/2032	0.177657
-0.1628718214	0.4069779162	2911/16384	0.177673
-0.162385697	0.4072356882	91/512	0.177734
-0.162385697	0.4072356882	91/512	0.177734
-0.1618713341	0.4076736779	2913/16384	0.177795
-0.1625537696	0.4080714705	1457/8192	0.177856
-0.1632983962	0.4079244805	2915/16384	0.177917
-0.1634296526	0.4079842432	353/1984	0.177923
-0.1634966251	0.407616657	121/680	0.177941
-0.1636930083	0.4078722089	729/4096	0.177979
-0.1637143238	0.4082486668	319/1792	0.178013
-0.1641670882	0.4079314096	2917/16384	0.17804
-0.1643706367	0.4077414524	359/2016	0.178075
-0.1645493065	0.4061047958	1459/8192	0.178101
-0.1640277893	0.4051502525	2919/16384	0.178162
-0.1647126053	0.4050812542	365/2048	0.178223
-0.1656479137	0.4050733924	2921/16384	0.178284
-0.164824013	0.4037886994	1461/8192	0.178345
-0.1643741638	0.4040255103	365/2046	0.178397
-0.1642189929	0.4038148838	2923/16384	0.178406
-0.1640881829	0.4030372862	731/4096	0.178467
-0.1651384467	0.4012679316	2925/16384	0.178528
-0.166341209	0.3996543215	1463/8192	0.178589
-0.1692782727	0.4034448616	363/2032	0.178642
-0.1685379555	0.4031652661	343/1920	0.178646
-0.1687805687	0.4027566454	2927/16384	0.17865
-0.1669123449	0.4028801924	183/1024	0.178711
-0.1669123449	0.4028801924	183/1024	0.178711
-0.1653192203	0.4034606423	2929/16384	0.178772
-0.1662307509	0.4051077805	1465/8192	0.178833
-0.1684433228	0.4060326105	2931/16384	0.178894
-0.1696899001	0.4055986699	73/408	0.178922
-0.1696553643	0.4060638019	355/1984	0.178931
-0.1693461182	0.4063148007	733/4096	0.178955
-0.1703449997	0.406868035	2933/16384	0.179016
-0.1705382199	0.4065582757	275/1536	0.179036
-0.172183229	0.406498266	361/2016	0.179067
-0.1712059211	0.406677765	1467/8192	0.179077
-0.1714967301	0.4093316595	2935/16384	0.179138
-0.1701702517	0.4083453668	367/2048	0.179199
-0.1690758681	0.4074325456	2937/16384	0.17926
-0.1682577881	0.4090801451	1469/8192	0.179321
-0.1684837741	0.4098537839	367/2046	0.179374
-0.1682396162	0.4098341438	2939/16384	0.179382
-0.1674963062	0.4096618172	735/4096	0.179443
-0.1667914698	0.4089835713	2941/16384	0.179504
-0.1659816372	0.4089632482	367/2044	0.17955
-0.1662822437	0.4087621544	1471/8192	0.179565
-0.1663742845	0.407783675	365/2032	0.179626
-0.1664130444	0.4077568229	2943/16384	0.179626
-0.1670584969	0.4080881052	23/128	0.179688
-0.1670584969	0.4080881052	23/128	0.179688
-0.1678090084	0.4087382674	2945/16384	0.179749
-0.1684938126	0.4070944329	1473/8192	0.17981
-0.1665737062	0.4059661583	2947/16384	0.179871
-0.165962382	0.4065051993	367/2040	0.179902
-0.1658379196	0.4059666064	737/4096	0.179932
-0.1660075782	0.4061392079	357/1984	0.17994
-0.1650634747	0.4058880425	2949/16384	0.179993
-0.1645607988	0.4078269712	1475/8192	0.180054
-0.1643706367	0.4077414524	121/672	0.18006
-0.1647041576	0.4085995369	2951/16384	0.180115
-0.1642788846	0.4084741481	369/2048	0.180176
-0.1637992195	0.4083560118	2953/16384	0.180237
-0.1637143238	0.4082486668	323/1792	0.180246
-0.1638652353	0.409032069	1477/8192	0.180298
-0.1640083902	0.4092095712	277/1536	0.180339
-0.1641263821	0.4091684987	123/682	0.180352
-0.1641156957	0.4092796056	2955/16384	0.180359
-0.1647841112	0.410675864	739/4096	0.18042
-0.1653752508	0.4111490031	2957/16384	0.180481
-0.1659544519	0.4113170469	369/2044	0.180528
-0.1657431554	0.4113900997	1479/8192	0.180542
-0.1654144881	0.4119905266	2959/16384	0.180603
-0.1653694926	0.4118422659	367/2032	0.18061
-0.1651328174	0.4117060943	185/1024	0.180664
-0.1651328174	0.4117060943	185/1024	0.180664
-0.164738492	0.4113436468	2961/16384	0.180725
-0.1648071554	0.4112923485	347/1920	0.180729
-0.1644264339	0.4120469683	1481/8192	0.180786
-0.1648788532	0.412708571	2963/16384	0.180847
-0.1652515382	0.4127612496	123/680	0.180882
-0.1652662527	0.4128979306	741/4096	0.180908
-0.165317244	0.4133505264	359/1984	0.180948
-0.1656778304	0.4130437919	2965/16384	0.180969
-0.165913459	0.4128151024	1483/8192	0.18103
-0.1659879384	0.4131599339	365/2016	0.181052
-0.1671297303	0.4127931689	2967/16384	0.181091
-0.168149662	0.4145016146	371/2048	0.181152
-0.1689541293	0.4150899361	2969/16384	0.181213
-0.1698886468	0.414120457	1485/8192	0.181274
-0.1699998241	0.4132879741	371/2046	0.181329
-0.1701317431	0.4134223626	2971/16384	0.181335
-0.1707782737	0.413862785	743/4096	0.181396
-0.1709727054	0.4147940824	2973/16384	0.181458
-0.1712792714	0.415391901	53/292	0.181507
-0.1712092678	0.4152186294	1487/8192	0.181519
-0.1705740128	0.4157049243	2975/16384	0.18158
-0.1703193954	0.415489734	369/2032	0.181594
-0.1704008336	0.4152307577	93/512	0.181641
-0.1704008336	0.4152307577	93/512	0.181641
-0.1701928341	0.4145204618	2977/16384	0.181702
-0.1693178427	0.4153211973	1489/8192	0.181763
-0.1693055041	0.4151477942	349/1920	0.181771
-0.1695127201	0.4164365538	2979/16384	0.181824
-0.170074667	0.4167183014	371/2040	0.181863
-0.1699489368	0.4167370673	745/4096	0.181885
-0.1702695871	0.4171512042	2981/16384	0.181946
-0.1704030925	0.4172670963	361/1984	0.181956
-0.1718590041	0.4173033224	1491/8192	0.182007
-0.1720292258	0.4164522943	367/2016	0.182044
-0.1721494672	0.4162819168	2983/16384	0.182068
-0.1724954307	0.4166215111	373/2048	0.182129
-0.1729792281	0.4170148547	2985/16384	0.18219
-0.1731486982	0.41605557	1493/8192	0.182251
-0.1727710394	0.4158786966	373/2046	0.182307
-0.1728456448	0.4158644973	2987/16384	0.182312
-0.1730095736	0.4155224046	747/4096	0.182373
-0.1738214407	0.415082183	2989/16384	0.182434
-0.1750759752	0.4136769672	373/2044	0.182485
-0.1744057599	0.4143612811	1495/8192	0.182495
-0.175508495	0.416324693	2991/16384	0.182556
-0.1746076123	0.4167507989	371/2032	0.182579
-0.1743984612	0.4160475421	187/1024	0.182617
-0.1743984612	0.4160475421	187/1024	0.182617
-0.1734802015	0.4159333138	2993/16384	0.182678
-0.1733754359	0.4170983801	1497/8192	0.182739
-0.1740012303	0.419033638	2995/16384	0.1828
-0.1747393885	0.4189237104	117/640	0.182812
-0.1755273124	0.419511705	373/2040	0.182843
-0.174988414	0.4194382762	749/4096	0.182861
-0.1758955667	0.4204249944	2997/16384	0.182922
-0.1762165389	0.4200724194	281/1536	0.182943
-0.1766439834	0.4194995758	363/1984	0.182964
-0.1769881012	0.4202703112	1499/8192	0.182983
-0.176824379	0.4239979738	2999/16384	0.183044
-0.1752846866	0.422097728	375/2048	0.183105
-0.1745210481	0.4205485725	3001/16384	0.183167
-0.1725161273	0.4214641664	1501/8192	0.183228
-0.1715251259	0.422398752	125/682	0.183284
-0.171784467	0.4223014605	3003/16384	0.183289
-0.1712333604	0.4214027213	751/4096	0.18335
-0.1713856786	0.4202245637	3005/16384	0.183411
-0.1712471128	0.4194470069	375/2044	0.183464
-0.1711726742	0.4196346984	1503/8192	0.183472
-0.1720885275	0.4191356465	3007/16384	0.183533
-0.1726319323	0.4195885607	373/2032	0.183563
-0.1722136185	0.4198098083	47/256	0.183594
-0.1722136185	0.4198098083	47/256	0.183594
-0.1722021016	0.4208053306	3009/16384	0.183655
-0.1739129219	0.4200791748	1505/8192	0.183716
-0.173598137	0.4178037938	3011/16384	0.183777
-0.1726686992	0.4176913896	25/136	0.183824
-0.1728945785	0.4176554645	753/4096	0.183838
-0.1732243268	0.4176942984	353/1920	0.183854
-0.1723845066	0.417252411	3013/16384	0.183899
-0.1707533952	0.4171862084	1507/8192	0.18396
-0.1704030925	0.4172670963	365/1984	0.183972
-0.1702674985	0.4181622805	3015/16384	0.184021
-0.1702790757	0.4179740308	53/288	0.184028
-0.1700106269	0.4177071941	377/2048	0.184082
-0.169712836	0.4172160359	3017/16384	0.184143
-0.1691283335	0.4178900039	1509/8192	0.184204
-0.1691882759	0.4182076264	283/1536	0.184245
-0.1693257947	0.418363504	377/2046	0.184262
-0.1692817274	0.4183300586	3019/16384	0.184265
-0.1677479611	0.4193051208	755/4096	0.184326
-0.168213366	0.4204598947	3021/16384	0.184387
-0.1682650586	0.4210309652	377/2044	0.184442
-0.1683610955	0.4209770915	1511/8192	0.184448
-0.167667968	0.4211913792	3023/16384	0.184509
-0.1675035281	0.4207704804	375/2032	0.184547
-0.1676326881	0.4207919856	189/1024	0.18457
-0.1676326881	0.4207919856	189/1024	0.18457
-0.1675233085	0.4202218211	3025/16384	0.184631
-0.1668342338	0.4206726135	1513/8192	0.184692
-0.1666072996	0.4205746074	331/1792	0.18471
-0.1665482845	0.4215286707	3027/16384	0.184753
-0.1670667413	0.4219060895	377/2040	0.184804
-0.1670327583	0.4218282754	757/4096	0.184814
-0.1673003785	0.4221218145	3029/16384	0.184875
-0.1673775834	0.4220239409	71/384	0.184896
-0.1675595899	0.4220431943	1515/8192	0.184937
-0.167910375	0.4222799346	367/1984	0.18498
-0.1680654388	0.42265715	3031/16384	0.184998
-0.1676177731	0.4233770507	373/2016	0.18502
-0.1673666191	0.4226758277	379/2048	0.185059
-0.1668787415	0.4223058821	3033/16384	0.18512
-0.1661311844	0.4230809098	1517/8192	0.185181
-0.165840575	0.4239338464	379/2046	0.185239
-0.1660004398	0.4239030612	3035/16384	0.185242
-0.1651377231	0.4235038868	759/4096	0.185303
-0.164989686	0.4224295467	3037/16384	0.185364
-0.164917021	0.4219074443	379/2044	0.185421
-0.1648195961	0.4218731439	1519/8192	0.185425
-0.1655409983	0.4215926886	3039/16384	0.185486
-0.1657480979	0.4221552532	377/2032	0.185531
-0.1656109562	0.4220364675	95/512	0.185547
-0.1656109562	0.4220364675	95/512	0.185547
-0.1657252204	0.4226830632	3041/16384	0.185608
-0.1665358586	0.4221059302	1521/8192	0.185669
-0.166764019	0.4212025123	3043/16384	0.18573
-0.1662922518	0.4207745705	379/2040	0.185784
-0.1662996289	0.4208398183	761/4096	0.185791
-0.1666072996	0.4205746074	333/1792	0.185826
-0.1660987253	0.4203939449	3045/16384	0.185852
-0.1653976543	0.4198707721	1523/8192	0.185913
-0.1648203297	0.4203192164	119/640	0.185938
-0.1645241714	0.4205359958	3047/16384	0.185974
-0.1643909968	0.4203425286	369/1984	0.185988
-0.1643657915	0.4201274894	125/672	0.186012
-0.1644849471	0.4201423868	381/2048	0.186035
-0.164381785	0.4197066742	3049/16384	0.186096
-0.163856954	0.4200614234	1525/8192	0.186157
-0.1638389994	0.4203577598	127/682	0.186217
-0.163859499	0.4203606218	3051/16384	0.186218
-0.163513228	0.4204030669	763/4096	0.186279
-0.1630187235	0.4199356591	3053/16384	0.18634
-0.162639173	0.419635968	381/2044	0.186399
-0.1625551059	0.4195645783	1527/8192	0.186401
-0.1632658051	0.4189419622	3055/16384	0.186462
-0.1633873515	0.4194941416	379/2032	0.186516
-0.1634042208	0.4193909389	191/1024	0.186523
-0.1634042208	0.4193909389	191/1024	0.186523
-0.1636136542	0.4198590232	3057/16384	0.186584
-0.1641825226	0.4194409577	1529/8192	0.186646
-0.1644949829	0.418820392	3059/16384	0.186707
-0.1641313628	0.4183098039	127/680	0.186765
-0.1641065184	0.4182938848	765/4096	0.186768
-0.1639850549	0.4179120537	3061/16384	0.186829
-0.1638611862	0.4179542356	287/1536	0.186849
-0.1636942467	0.4178068497	1531/8192	0.18689
-0.163906507	0.4169693818	3063/16384	0.186951
-0.1645358911	0.4173125741	359/1920	0.186979
-0.1644117169	0.4175338845	371/1984	0.186996
-0.1642662701	0.4175613912	377/2016	0.187004
-0.1642716903	0.4174546099	383/2048	0.187012
-0.1644500506	0.4179486484	3065/16384	0.187073
-0.1651518283	0.4176248198	1533/8192	0.187134
-0.1653686123	0.4172441508	383/2046	0.187195
-0.1653851109	0.4172487412	3067/16384	0.187195
-0.1657317473	0.4175706848	767/4096	0.187256
-0.165761077	0.4181667494	3069/16384	0.187317
-0.1658743658	0.4185185108	383/2044	0.187378
-0.1658786185	0.4185075672	1535/8192	0.187378
-0.1653636501	0.4187404127	3071/16384	0.187439
-0.1653230409	0.4184002483	3/16	0.1875
-0.1653230409	0.4184002483	3/16	0.1875
-0.1652924403	0.4179392123	3073/16384	0.187561
-0.1646254572	0.4182347407	1537/8192	0.187622
-0.1642877421	0.4188340567	3075/16384	0.187683
-0.1647005237	0.4193421393	769/4096	0.187744
-0.1646772558	0.4193576638	383/2040	0.187745
-0.1648518034	0.4197561335	3077/16384	0.187805
-0.1655170375	0.4202971137	1539/8192	0.187866
-0.1663433059	0.4195446659	3079/16384	0.187927
-0.1664507294	0.4199499876	385/2048	0.187988
-0.1664980424	0.4198383853	379/2016	0.187996
-0.1663134432	0.4198166333	373/1984	0.188004
-0.1661343901	0.4200986826	361/1920	0.188021
-0.1666019297	0.4204207237	3081/16384	0.188049
-0.1666072996	0.4205746074	337/1792	0.188058
-0.1672212303	0.4199653795	1541/8192	0.18811
-0.1672191597	0.419674103	289/1536	0.188151
-0.1671522296	0.419554007	3083/16384	0.188171
-0.1671466017	0.419528782	35/186	0.188172
-0.1686533239	0.4186675825	771/4096	0.188232
-0.1679979583	0.4175783337	3085/16384	0.188293
-0.1677246225	0.4171377709	1543/8192	0.188354
-0.1676856707	0.4170679399	55/292	0.188356
-0.1683320435	0.4166679048	3087/16384	0.188416
-0.1685083264	0.4170897995	193/1024	0.188477
-0.1685083264	0.4170897995	193/1024	0.188477
-0.1685576412	0.4169398054	383/2032	0.188484
-0.1687759233	0.4176777872	3089/16384	0.188538
-0.169437159	0.4170011447	1545/8192	0.188599
-0.1692785539	0.4159418051	3091/16384	0.18866
-0.1688006473	0.4156900879	773/4096	0.188721
-0.1687134996	0.4157586377	77/408	0.188725
-0.168359814	0.4154273031	3093/16384	0.188782
-0.1680594335	0.4156338733	1547/8192	0.188843
-0.1668608287	0.4154184428	3095/16384	0.188904
-0.1659844711	0.4138538116	387/2048	0.188965
-0.1659879384	0.4131599339	127/672	0.188988
-0.165317244	0.4133505264	375/1984	0.189012
-0.165208299	0.4134545834	3097/16384	0.189026
-0.1648097614	0.4142241472	121/640	0.189062
-0.1646520982	0.414335431	1549/8192	0.189087
-0.1645401795	0.4148615107	3099/16384	0.189148
-0.1646027163	0.4148428131	129/682	0.18915
-0.164037927	0.4146359911	775/4096	0.189209
-0.1637350105	0.4140586241	3101/16384	0.18927
-0.1634715377	0.4137954643	1551/8192	0.189331
-0.1633870103	0.4138745759	387/2044	0.189335
-0.1637935894	0.4132942142	3103/16384	0.189392
-0.1640484985	0.4135898735	97/512	0.189453
-0.1640484985	0.4135898735	97/512	0.189453
-0.1638406405	0.4135312438	385/2032	0.189469
-0.1643617169	0.4140454839	3105/16384	0.189514
-0.1648557903	0.4132771376	1553/8192	0.189575
-0.1643716952	0.4125718908	3107/16384	0.189636
-0.1640054097	0.412336167	777/4096	0.189697
-0.1640271807	0.4124960205	129/680	0.189706
-0.1636713632	0.4120355948	3109/16384	0.189758
-0.1628372355	0.4126289998	1555/8192	0.189819
-0.1625851232	0.4132391725	3111/16384	0.18988
-0.1623046022	0.4130085621	389/2048	0.189941
-0.1623782548	0.4125891997	383/2016	0.18998
-0.1619198743	0.4127057662	3113/16384	0.190002
-0.1616183004	0.4127254422	377/1984	0.19002
-0.1617844718	0.4134689045	1557/8192	0.190063
-0.1619705968	0.4136295467	73/384	0.190104
-0.1620744691	0.4136601535	3115/16384	0.190125
-0.1620442979	0.4136150043	389/2046	0.190127
-0.1619739601	0.4140453822	779/4096	0.190186
-0.1615783074	0.4149623599	3117/16384	0.190247
-0.1618757176	0.415671771	1559/8192	0.190308
-0.1619935363	0.4155037823	389/2044	0.190313
-0.1609169086	0.4163444569	3119/16384	0.190369
-0.1606645915	0.4157519268	195/1024	0.19043
-0.1606645915	0.4157519268	195/1024	0.19043
-0.1610823796	0.4156330518	387/2032	0.190453
-0.1600022115	0.4151449765	3121/16384	0.190491
-0.1596483226	0.4160400658	1561/8192	0.190552
-0.1599012745	0.4167119726	3123/16384	0.190613
-0.1600853858	0.4171652777	781/4096	0.190674
-0.1599487141	0.4170718418	389/2040	0.190686
-0.1602433141	0.4175313831	3125/16384	0.190735
-0.1603657349	0.4174825199	293/1536	0.190755
-0.1605491803	0.4176237753	1563/8192	0.190796
-0.1603756738	0.418466078	3127/16384	0.190857
-0.160000397	0.41801769	391/2048	0.190918
-0.1597865506	0.4176511711	55/288	0.190972
-0.1597665927	0.4175781729	3129/16384	0.190979
-0.1592599612	0.4180350583	379/1984	0.191028
-0.1592255903	0.4179607944	1565/8192	0.19104
-0.1590664021	0.4182901474	3131/16384	0.191101
-0.1590750084	0.4182202461	391/2046	0.191105
-0.1586281803	0.4179918733	367/1920	0.191146
-0.158756154	0.4180770925	783/4096	0.191162
-0.1586225988	0.4176549302	3133/16384	0.191223
-0.1584495402	0.4174195323	1567/8192	0.191284
-0.1584761141	0.4175363672	391/2044	0.191292
-0.1587599405	0.4170876024	3135/16384	0.191345
-0.1589049529	0.4173399729	49/256	0.191406
-0.1589049529	0.4173399729	49/256	0.191406
-0.1587405622	0.4175095394	389/2032	0.191437
-0.1590551442	0.4176868053	3137/16384	0.191467
-0.1595405915	0.4172907654	1569/8192	0.191528
-0.1593676703	0.4167089685	3139/16384	0.191589
-0.1590971739	0.4163231024	785/4096	0.19165
-0.1592850967	0.416404145	23/120	0.191667
-0.1587888442	0.4159670739	3141/16384	0.191711
-0.1582044441	0.4164078677	1571/8192	0.191772
-0.1577867565	0.4168358887	3143/16384	0.191833
-0.1575855863	0.416550962	393/2048	0.191895
-0.1573272384	0.4161948129	3145/16384	0.191956
-0.157316302	0.4160166328	43/224	0.191964
-0.1569155652	0.4167271786	1573/8192	0.192017
-0.1565141974	0.4167877514	381/1984	0.192036
-0.1569719333	0.4170744255	295/1536	0.192057
-0.1571346353	0.417179347	3147/16384	0.192078
-0.1570088301	0.4171300929	131/682	0.192082
-0.1571627031	0.417760166	787/4096	0.192139
-0.1571829533	0.4182877827	123/640	0.192188
-0.1572549359	0.4183805949	3149/16384	0.1922
-0.1574907141	0.418685788	1575/8192	0.192261
-0.1574184358	0.4185297618	393/2044	0.19227
-0.1571526433	0.4191490098	3151/16384	0.192322
-0.1568983659	0.4188546567	197/1024	0.192383
-0.1568983659	0.4188546567	197/1024	0.192383
-0.1570934154	0.4184777673	391/2032	0.192421
-0.1566105415	0.418382164	3153/16384	0.192444
-0.1559377295	0.4190781092	1577/8192	0.192505
-0.1554944156	0.4188387498	345/1792	0.192522
-0.1565233907	0.4199658969	3155/16384	0.192566
-0.1573170969	0.4201449238	789/4096	0.192627
-0.1573558489	0.4205360463	131/680	0.192647
-0.1577215952	0.4199542298	3157/16384	0.192688
-0.1577451693	0.4196885946	1579/8192	0.192749
-0.1582691324	0.4194783341	3159/16384	0.19281
-0.158237376	0.4199373531	395/2048	0.192871
-0.1579853967	0.4204150451	3161/16384	0.192932
-0.1582951846	0.4205823442	389/2016	0.192956
-0.1588693794	0.4206410319	1581/8192	0.192993
-0.1591437764	0.4203127579	383/1984	0.193044
-0.1593403887	0.4203274436	3163/16384	0.193054
-0.1593171024	0.420434303	395/2046	0.19306
-0.1596749117	0.4208845701	791/4096	0.193115
-0.159389183	0.4217472618	3165/16384	0.193176
-0.159141214	0.4224598738	371/1920	0.193229
-0.1593056148	0.4223674811	1583/8192	0.193237
-0.1592893485	0.4221342578	395/2044	0.193249
-0.1584156484	0.4223428542	3167/16384	0.193298
-0.1585763168	0.4218236954	99/512	0.193359
-0.1585763168	0.4218236954	99/512	0.193359
-0.1589247911	0.4215352733	393/2032	0.193406
-0.1588283903	0.4211971846	3169/16384	0.19342
-0.157793485	0.420990781	1585/8192	0.193481
-0.1570969914	0.4218951123	3171/16384	0.193542
-0.1569232889	0.4230603942	793/4096	0.193604
-0.1562291303	0.423308998	79/408	0.193627
-0.1561359449	0.423695924	347/1792	0.193638
-0.1572403997	0.4239515323	3173/16384	0.193665
-0.1581400266	0.4238160222	1587/8192	0.193726
-0.1591709568	0.4239553464	3175/16384	0.193787
-0.159089169	0.4244637318	397/2048	0.193848
-0.1591312352	0.4250515606	3177/16384	0.193909
-0.1596799206	0.4247233497	391/2016	0.193948
-0.1598483371	0.4247418069	1589/8192	0.19397
-0.1599240652	0.4243582179	3179/16384	0.194031
-0.1600016732	0.4243913197	397/2046	0.194037
-0.1600204147	0.4241114869	385/1984	0.194052
-0.1603619558	0.4243773299	795/4096	0.194092
-0.1608472217	0.4250306339	3181/16384	0.194153
-0.1613763123	0.4255772388	1591/8192	0.194214
-0.1610479572	0.4255000613	397/2044	0.194227
-0.1602931419	0.4261190231	373/1920	0.194271
-0.1603967787	0.4261615514	3183/16384	0.194275
-0.1603227199	0.4256312563	199/1024	0.194336
-0.1603227199	0.4256312563	199/1024	0.194336
-0.1601950668	0.4251995126	395/2032	0.19439
-0.1601660014	0.4250623832	3185/16384	0.194397
-0.1594396222	0.4254567052	1593/8192	0.194458
-0.1593992674	0.4260632004	3187/16384	0.194519
-0.1593098115	0.4266942137	797/4096	0.19458
-0.1590588288	0.4268706891	397/2040	0.194608
-0.1593580469	0.4271534025	3189/16384	0.194641
-0.1595175549	0.4271338942	299/1536	0.194661
-0.1596891437	0.427327132	1595/8192	0.194702
-0.159317032	0.4281521189	3191/16384	0.194763
-0.159023875	0.4276279242	399/2048	0.194824
-0.1589024391	0.4271286396	3193/16384	0.194885
-0.1581693589	0.4273755988	131/672	0.19494
-0.15821132	0.4273455881	1597/8192	0.194946
-0.1579449821	0.4277200179	3195/16384	0.195007
-0.157859288	0.4275928794	133/682	0.195015
-0.1576221548	0.4273127923	387/1984	0.19506
-0.1576008856	0.4274030203	799/4096	0.195068
-0.1575885458	0.4268622131	3197/16384	0.195129
-0.1574397108	0.4265092712	1599/8192	0.19519
-0.1576019825	0.426636156	57/292	0.195205
-0.15793337	0.4262628994	3199/16384	0.195251
-0.1579853099	0.4265829887	25/128	0.195312
-0.1579853099	0.4265829887	25/128	0.195312
-0.1580106826	0.426981216	3201/16384	0.195374
-0.1580248402	0.4269890015	397/2032	0.195374
-0.1586351549	0.4267701581	1601/8192	0.195435
-0.1586773781	0.4262445763	3203/16384	0.195496
-0.1586780309	0.4256150987	801/4096	0.195557
-0.158945338	0.4254142819	133/680	0.195588
-0.1584660891	0.4250357727	3205/16384	0.195618
-0.1577656697	0.4252131648	1603/8192	0.195679
-0.1568279467	0.4254617107	3207/16384	0.19574
-0.1566111873	0.4249067432	401/2048	0.195801
-0.1562219711	0.4241411029	3209/16384	0.195862
-0.1561359449	0.423695924	351/1792	0.195871
-0.1553700327	0.4252004127	1605/8192	0.195923
-0.1550025768	0.4248048103	395/2016	0.195933
-0.1556328372	0.42570007	301/1536	0.195964
-0.155839874	0.4257921175	3211/16384	0.195984
-0.1556588789	0.4259051491	401/2046	0.195992
-0.1556899245	0.4264492988	803/4096	0.196045
-0.1552948589	0.4261298225	389/1984	0.196069
-0.1554558963	0.4273921556	3213/16384	0.196106
-0.15578288	0.4279385079	1607/8192	0.196167
-0.1554360112	0.4277624263	401/2044	0.196184
-0.1552056278	0.4285523091	3215/16384	0.196228
-0.1548743058	0.4281190299	201/1024	0.196289
-0.1548743058	0.4281190299	201/1024	0.196289
-0.1544517658	0.42737118	3217/16384	0.19635
-0.154679811	0.427330522	377/1920	0.196354
-0.1544840428	0.4269405762	399/2032	0.196358
-0.1536186732	0.42859657	1609/8192	0.196411
-0.154327187	0.4293160498	3219/16384	0.196472
-0.1550786773	0.430000358	805/4096	0.196533
-0.1557369869	0.4308441601	401/2040	0.196569
-0.1558766942	0.4299384449	3221/16384	0.196594
-0.1559682765	0.4294511754	1611/8192	0.196655
-0.1568064088	0.4291741497	3223/16384	0.196716
-0.1567827254	0.4298763161	403/2048	0.196777
-0.1563181695	0.4307500363	3225/16384	0.196838
-0.1580454357	0.430690595	1613/8192	0.196899
-0.1583585172	0.4304683439	397/2016	0.196925
-0.1583799855	0.4300409268	3227/16384	0.19696
-0.158567339	0.4301911968	13/66	0.19697
-0.158925476	0.4303559298	807/4096	0.197021
-0.1592403992	0.4309334031	391/1984	0.197077
-0.159208019	0.4310081321	3229/16384	0.197083
-0.1596177689	0.4312426202	1615/8192	0.197144
-0.1593392717	0.431335278	403/2044	0.197162
-0.1593965605	0.4319037205	3231/16384	0.197205
-0.1590145587	0.4316417606	101/512	0.197266
-0.1590145587	0.4316417606	101/512	0.197266
-0.158640886	0.4311442157	3233/16384	0.197327
-0.1583407995	0.4311284253	401/2032	0.197343
-0.1577865696	0.4322839998	1617/8192	0.197388
-0.1577064351	0.4317994351	379/1920	0.197396
-0.1587715464	0.4328812974	3235/16384	0.197449
-0.1598259849	0.433323344	809/4096	0.19751
-0.1605789871	0.4335863375	403/2040	0.197549
-0.1606642302	0.4330347119	3237/16384	0.197571
-0.160543547	0.4323427636	1619/8192	0.197632
-0.1607410923	0.4314152036	3239/16384	0.197693
-0.1611881072	0.4313614231	405/2048	0.197754
-0.1616424969	0.4310959178	3241/16384	0.197815
-0.1611318143	0.4306972913	1621/8192	0.197876
-0.1609321353	0.4307393439	19/96	0.197917
-0.160859702	0.4307920223	3243/16384	0.197937
-0.1608205526	0.430709661	135/682	0.197947
-0.1607320189	0.4305460453	811/4096	0.197998
-0.1608594818	0.4300890966	3245/16384	0.198059
-0.1606239682	0.430044396	393/1984	0.198085
-0.1607736646	0.4296303835	1623/8192	0.19812
-0.161010005	0.4297955446	405/2044	0.198141
-0.1615982933	0.4296479516	3247/16384	0.198181
-0.16137779	0.4300129197	203/1024	0.198242
-0.16137779	0.4300129197	203/1024	0.198242
-0.161146494	0.4303650418	3249/16384	0.198303
-0.1612988503	0.4304569468	403/2032	0.198327
-0.1617226212	0.4306600094	1625/8192	0.198364
-0.162170095	0.430370337	3251/16384	0.198425
-0.1625540985	0.4301938083	127/640	0.198437
-0.1628549672	0.4299467957	813/4096	0.198486
-0.1632313989	0.4298091572	27/136	0.198529
-0.1631923906	0.4294047474	3253/16384	0.198547
-0.1629852078	0.4293104302	305/1536	0.198568
-0.1629129532	0.4289738822	1627/8192	0.198608
-0.1639933591	0.4280102931	3255/16384	0.198669
-0.1640185044	0.4291051195	407/2048	0.19873
-0.1636231514	0.429855785	3257/16384	0.198792
-0.1646553157	0.4306142235	1629/8192	0.198853
-0.1659702346	0.430481805	401/2016	0.198909
-0.1656138762	0.4306670048	3259/16384	0.198914
-0.1656583353	0.4310437217	37/186	0.198925
-0.1652965835	0.4316010517	815/4096	0.198975
-0.1642979991	0.4318947055	3261/16384	0.199036
-0.1638145488	0.4321888454	395/1984	0.199093
-0.1638288629	0.4322746479	1631/8192	0.199097
-0.163795729	0.4319307843	407/2044	0.199119
-0.1633263968	0.4316519391	3263/16384	0.199158
-0.1637345573	0.431458169	51/256	0.199219
-0.1637345573	0.431458169	51/256	0.199219
-0.1643441027	0.4312256219	3265/16384	0.19928
-0.1640231941	0.4308917052	405/2032	0.199311
-0.1635678368	0.430458004	1633/8192	0.199341
-0.1629925325	0.4307657065	3267/16384	0.199402
-0.1622873683	0.4311095213	817/4096	0.199463
-0.1623816917	0.4308204851	383/1920	0.199479
-0.1618945472	0.4311768786	407/2040	0.19951
-0.1618948352	0.4315453411	3269/16384	0.199524
-0.1621939784	0.4320320133	1635/8192	0.199585
-0.1624165864	0.4331910793	3271/16384	0.199646
-0.1617096551	0.4334459294	409/2048	0.199707
-0.1608495249	0.4338132206	3273/16384	0.199768
-0.1618623301	0.4350136618	1637/8192	0.199829
-0.1625268327	0.434767086	307/1536	0.19987
-0.1626753418	0.4345316192	3275/16384	0.19989
-0.1628851374	0.4346816265	403/2016	0.199901
-0.1629870062	0.4346908232	409/2046	0.199902
-0.1634716672	0.4349996687	819/4096	0.199951
-0.1656479922	0.4366704081	3277/16384	0.200012
-0.1669316896	0.435350409	1639/8192	0.200073
-0.167549177	0.4361987996	409/2044	0.200098
-0.1678464626	0.4360882615	397/1984	0.200101
-0.1685794375	0.4361809773	3279/16384	0.200134
-0.168119055	0.4371379952	205/1024	0.200195
-0.168119055	0.4371379952	205/1024	0.200195
-0.1679512743	0.4392554241	3281/16384	0.200256
-0.1697594469	0.4382157351	407/2032	0.200295
-0.1700792992	0.4380914323	1641/8192	0.200317
-0.1706555049	0.4381092573	359/1792	0.200335
-0.1701624375	0.437062691	3283/16384	0.200378
-0.1706683158	0.4355013818	821/4096	0.200439
-0.1704858273	0.434822912	409/2040	0.20049
-0.1703223592	0.4346488952	3285/16384	0.2005
-0.1700745495	0.4348101518	77/384	0.200521
-0.1697267519	0.4346435194	1643/8192	0.200562
-0.169411158	0.4331980565	3287/16384	0.200623
-0.1705062189	0.4336666231	411/2048	0.200684
-0.1710602825	0.4346127049	3289/16384	0.200745
-0.1729043532	0.4338502633	1645/8192	0.200806
-0.1734429373	0.4323863759	3291/16384	0.200867
-0.1742765195	0.4320668607	137/682	0.20088
-0.1748555407	0.4333889178	823/4096	0.200928
-0.1744013943	0.4354861665	3293/16384	0.200989
-0.1744771198	0.4365648609	1647/8192	0.20105
-0.1736721247	0.4364205783	411/2044	0.201076
-0.1730653334	0.4364332355	399/1984	0.201109
-0.1730442855	0.4365076301	3295/16384	0.201111
-0.1732532734	0.435763342	103/512	0.201172
-0.1732532734	0.435763342	103/512	0.201172
-0.1735954035	0.43460319	3297/16384	0.201233
-0.1721511441	0.4350936935	409/2032	0.20128
-0.1717234229	0.4349685381	1649/8192	0.201294
-0.1716116671	0.4358798769	3299/16384	0.201355
-0.1711808058	0.4374292387	825/4096	0.201416
-0.1706555049	0.4381092573	361/1792	0.201451
-0.1714949093	0.4382516823	137/680	0.201471
-0.1716030444	0.438361899	3301/16384	0.201477
-0.1723449088	0.4382606682	1651/8192	0.201538
-0.1720226819	0.4388551845	129/640	0.201563
-0.1739795595	0.4392919628	3303/16384	0.201599
-0.1739314076	0.4402637249	413/2048	0.20166
-0.1740839113	0.4411212723	3305/16384	0.201721
-0.1752873135	0.440723894	1653/8192	0.201782
-0.1753170227	0.4400408307	3307/16384	0.201843
-0.1756139712	0.4397517892	413/2046	0.201857
-0.1765835419	0.4396902177	407/2016	0.201885
-0.1760057033	0.4400363387	827/4096	0.201904
-0.1765877057	0.4412749864	3309/16384	0.201965
-0.177343066	0.4420483584	1655/8192	0.202026
-0.1762287664	0.4424226113	59/292	0.202055
-0.1757532651	0.4426337674	3311/16384	0.202087
-0.1754933769	0.4419481914	401/1984	0.202117
-0.1758405589	0.4418853378	207/1024	0.202148
-0.1758405589	0.4418853378	207/1024	0.202148
-0.1758424111	0.4409577042	3313/16384	0.202209
-0.1746160615	0.4414434152	411/2032	0.202264
-0.1745851282	0.4413389264	1657/8192	0.202271
-0.1745176695	0.4420245221	3315/16384	0.202332
-0.1738182059	0.4431956092	829/4096	0.202393
-0.1739237873	0.4440167087	413/2040	0.202451
-0.1738765071	0.4439973217	3317/16384	0.202454
-0.1741580634	0.4439286609	311/1536	0.202474
-0.1744194114	0.4442047929	1659/8192	0.202515
-0.1736888036	0.4453962444	3319/16384	0.202576
-0.1730202846	0.4446064389	389/1920	0.202604
-0.1734095177	0.4445620886	415/2048	0.202637
-0.173428123	0.4437772946	3321/16384	0.202698
-0.1722678681	0.4437289624	1661/8192	0.202759
-0.1717927575	0.4442981145	3323/16384	0.20282
-0.1713166874	0.4440933493	415/2046	0.202835
-0.1714337486	0.4437732483	409/2016	0.202877
-0.1713549961	0.443748454	831/4096	0.202881
-0.171680491	0.4429027635	3325/16384	0.202942
-0.1715761944	0.4423456347	1663/8192	0.203003
-0.1720989387	0.4424601393	415/2044	0.203033
-0.172400067	0.4423476022	3327/16384	0.203064
-0.1722459694	0.4427629811	13/64	0.203125
-0.1722459694	0.4427629811	13/64	0.203125
-0.1719569609	0.4432985653	3329/16384	0.203186
-0.1730059035	0.4434660312	1665/8192	0.203247
-0.1730419529	0.4434517433	413/2032	0.203248
-0.1732036051	0.4428861467	3331/16384	0.203308
-0.1738136152	0.4418022526	833/4096	0.203369
-0.173521624	0.4410423955	3333/16384	0.20343
-0.173518096	0.4410974425	83/408	0.203431
-0.1729217945	0.4411125035	1667/8192	0.203491
-0.1714319805	0.4403932541	3335/16384	0.203552
-0.1712317819	0.439392446	417/2048	0.203613
-0.1720226819	0.4388551845	391/1920	0.203646
-0.1708458854	0.438384869	3337/16384	0.203674
-0.1706555049	0.4381092573	365/1792	0.203683
-0.1693775269	0.4393702078	1669/8192	0.203735
-0.1695888055	0.4401030379	313/1536	0.203776
-0.169809628	0.4402857411	3339/16384	0.203796
-0.1696447342	0.4407505192	139/682	0.203812
-0.1691777806	0.4409677409	835/4096	0.203857
-0.1694561507	0.4408579598	137/672	0.203869
-0.16668879	0.4426007202	3341/16384	0.203918
-0.1680415962	0.4441952428	1671/8192	0.203979
-0.1669136152	0.4450798629	417/2044	0.204012
-0.1672879743	0.4457870466	3343/16384	0.204041
-0.1663150762	0.445505836	209/1024	0.204102
-0.1663150762	0.445505836	209/1024	0.204102
-0.1666643454	0.4446053194	405/1984	0.204133
-0.1642234849	0.446037554	3345/16384	0.204163
-0.1658701559	0.4475369677	1673/8192	0.204224
-0.1656153752	0.4479753337	415/2032	0.204232
-0.1668078325	0.4472472997	3347/16384	0.204285
-0.168206166	0.4476554163	837/4096	0.204346
-0.1689548506	0.4471071622	3349/16384	0.204407
-0.1690851188	0.4470525815	139/680	0.204412
-0.1687733884	0.4465759499	1675/8192	0.204468
-0.169804179	0.4461232158	3351/16384	0.204529
-0.1696980198	0.4469316246	419/2048	0.20459
-0.1691164599	0.4475779047	3353/16384	0.204651
-0.1695845941	0.4480358572	131/640	0.204687
-0.1704584376	0.4489153462	1677/8192	0.204712
-0.1716078297	0.4479249076	3355/16384	0.204773
-0.1724606012	0.4481792583	419/2046	0.20479
-0.1724606592	0.44864709	839/4096	0.204834
-0.1718578339	0.4489829256	59/288	0.204861
-0.1728988983	0.4500600321	3357/16384	0.204895
-0.1736030298	0.4502171031	1679/8192	0.204956
-0.1732206491	0.4508659912	419/2044	0.20499
-0.1733708802	0.4510959346	3359/16384	0.205017
-0.1728841891	0.4508696351	105/512	0.205078
-0.1728841891	0.4508696351	105/512	0.205078
-0.1720877515	0.4500358515	3361/16384	0.205139
-0.1722666399	0.4501284286	407/1984	0.205141
-0.1722057958	0.4522651649	1681/8192	0.2052
-0.1723997498	0.4526660071	417/2032	0.205217
-0.1729391046	0.4520287031	3363/16384	0.205261
-0.1740899243	0.4524135782	841/4096	0.205322
-0.1746296725	0.4519644587	3365/16384	0.205383
-0.1746786992	0.4517826837	419/2040	0.205392
-0.1744424293	0.4515513847	1683/8192	0.205444
-0.1751690978	0.4506772762	3367/16384	0.205505
-0.1759791661	0.4505271921	421/2048	0.205566
-0.1765649638	0.4501609673	3369/16384	0.205627
-0.1759017946	0.4494352785	1685/8192	0.205688
-0.1755691894	0.4495640654	79/384	0.205729
-0.1754726617	0.4496618082	3371/16384	0.20575
-0.1751760559	0.4494922306	421/2046	0.205767
-0.1752706439	0.4493013871	843/4096	0.205811
-0.1755726541	0.4491263925	415/2016	0.205853
-0.1756436195	0.4485932998	3373/16384	0.205872
-0.1754953793	0.4479057389	1687/8192	0.205933
-0.1764020132	0.4482048577	421/2044	0.205969
-0.1767526185	0.4482173518	3375/16384	0.205994
-0.1762764285	0.4486212975	211/1024	0.206055
-0.1762764285	0.4486212975	211/1024	0.206055
-0.1757578129	0.449035176	3377/16384	0.206116
-0.1760139785	0.4491643019	409/1984	0.206149
-0.1764654724	0.4497222483	1689/8192	0.206177
-0.1766750255	0.4498921443	419/2032	0.206201
-0.1770115044	0.4494485712	3379/16384	0.206238
-0.1789084978	0.4498889855	845/4096	0.206299
-0.180572921	0.44820296	3381/16384	0.20636
-0.1800270921	0.4478754798	421/2040	0.206373
-0.1797214034	0.4481537353	317/1536	0.20638
-0.1794049397	0.4474038697	1691/8192	0.206421
-0.1807603261	0.4452274378	3383/16384	0.206482
-0.1816081102	0.4465868929	423/2048	0.206543
-0.1830422516	0.4483921832	3385/16384	0.206604
-0.1843058946	0.4463132578	1693/8192	0.206665
-0.1840736572	0.4454130895	3387/16384	0.206726
-0.1846500784	0.4449154754	141/682	0.206745
-0.185123647	0.4455307049	397/1920	0.206771
-0.1848572265	0.4454445926	847/4096	0.206787
-0.1855186612	0.4462897505	139/672	0.206845
-0.1854830661	0.4462990903	3389/16384	0.206848
-0.1860107019	0.4463979678	1695/8192	0.206909
-0.1857741254	0.4470793661	423/2044	0.206947
-0.185707941	0.4472328637	3391/16384	0.20697
-0.1853153129	0.4468865011	53/256	0.207031
-0.1853153129	0.4468865011	53/256	0.207031
-0.1848673279	0.4462224017	3393/16384	0.207092
-0.183825646	0.4476419039	1697/8192	0.207153
-0.1839249947	0.4474352654	411/1984	0.207157
-0.1842484103	0.4483598153	421/2032	0.207185
-0.1847374769	0.4480836629	3395/16384	0.207214
-0.1865418509	0.4487943286	849/4096	0.207275
-0.1870247697	0.4482416324	3397/16384	0.207336
-0.1868455798	0.4480430746	141/680	0.207353
-0.1868387327	0.4478673208	1699/8192	0.207397
-0.1878049247	0.4466725959	3399/16384	0.207458
-0.1883835275	0.4462864667	425/2048	0.20752
-0.1887981191	0.4459447704	3401/16384	0.207581
-0.1881776785	0.4453381211	1701/8192	0.207642
-0.1878959131	0.4454848904	319/1536	0.207682
-0.1878212963	0.4455845061	3403/16384	0.207703
-0.187444724	0.4455814036	425/2046	0.207722
-0.1875810452	0.4452462185	851/4096	0.207764
-0.1879724874	0.4450060654	133/640	0.207813
-0.1881327167	0.4443276107	3405/16384	0.207825
-0.1883471757	0.4439838824	419/2016	0.207837
-0.1864797278	0.4429828086	1703/8192	0.207886
-0.1860318626	0.4422572959	425/2044	0.207926
-0.1859668151	0.4420612783	3407/16384	0.207947
-0.1864003016	0.4419028922	213/1024	0.208008
-0.1864003016	0.4419028922	213/1024	0.208008
-0.1869705074	0.4415257413	3409/16384	0.208069
-0.1861981852	0.4409834962	1705/8192	0.20813
-0.1860763929	0.4408275623	373/1792	0.208147
-0.1858639126	0.4410775304	413/1984	0.208165
-0.1859327338	0.4411447704	423/2032	0.208169
-0.1858685008	0.4412152259	3411/16384	0.208191
-0.1848726341	0.4415967937	853/4096	0.208252
-0.1847532788	0.4420806297	3413/16384	0.208313
-0.1849083529	0.4420726323	5/24	0.208333
-0.1849954662	0.4422388403	1707/8192	0.208374
-0.1845971622	0.4428819774	3415/16384	0.208435
-0.1843963796	0.4423475601	427/2048	0.208496
-0.1845229174	0.4418025424	3417/16384	0.208557
-0.1835011262	0.441414849	1709/8192	0.208618
-0.1829188557	0.4419440774	3419/16384	0.208679
-0.1821523757	0.4418549413	427/2046	0.2087
-0.1824777505	0.4411835091	855/4096	0.20874
-0.1834064783	0.4401998038	3421/16384	0.208801
-0.1829266709	0.4394126487	421/2016	0.208829
-0.183980278	0.4396456427	401/1920	0.208854
-0.1837676631	0.4395671235	1711/8192	0.208862
-0.1843481826	0.4400814737	61/292	0.208904
-0.1844793305	0.4403205719	3423/16384	0.208923
-0.1840255939	0.4405371669	107/512	0.208984
-0.1840255939	0.4405371669	107/512	0.208984
-0.1833624071	0.4409336331	3425/16384	0.209045
-0.1843493366	0.4415440444	1713/8192	0.209106
-0.1845852781	0.4413407974	425/2032	0.209154
-0.1846715611	0.441240159	3427/16384	0.209167
-0.1846402209	0.4413098711	415/1984	0.209173
-0.185716428	0.44084443	857/4096	0.209229
-0.1860763929	0.4408275623	375/1792	0.209263
-0.1859602615	0.4403470439	3429/16384	0.20929
-0.1857563753	0.4403241321	427/2040	0.209314
-0.1857077407	0.4400601719	1715/8192	0.209351
-0.1859106802	0.4380524092	3431/16384	0.209412
-0.1866257775	0.4373684783	429/2048	0.209473
-0.1873370206	0.4367207732	3433/16384	0.209534
-0.1858825682	0.4357553446	1717/8192	0.209595
-0.1853305191	0.4363736483	3435/16384	0.209656
-0.1848277464	0.4366323568	13/62	0.209677
-0.1846602941	0.4358559572	859/4096	0.209717
-0.1849513531	0.4337140721	3437/16384	0.209778
-0.1845013267	0.4318061804	1719/8192	0.209839
-0.1876087284	0.4312820827	429/2044	0.209883
-0.18815179	0.4334551371	403/1920	0.209896
-0.188225856	0.4330629502	3439/16384	0.2099
-0.1867539996	0.4339258212	215/1024	0.209961
-0.1867539996	0.4339258212	215/1024	0.209961
-0.1856098056	0.4351121479	3441/16384	0.210022
-0.1872989287	0.4362036826	1721/8192	0.210083
-0.1880290397	0.4357675417	427/2032	0.210138
-0.1881074577	0.4359333003	3443/16384	0.210144
-0.1911129386	0.4363185561	417/1984	0.210181
-0.1910719536	0.4366907105	861/4096	0.210205
-0.1927536615	0.4365458489	3445/16384	0.210266
-0.1925905299	0.4359581075	323/1536	0.210286
-0.1922702243	0.4357070537	143/680	0.210294
-0.193286144	0.4353934526	1723/8192	0.210327
-0.1957513196	0.438537778	3447/16384	0.210388
-0.193495375	0.4380078506	431/2048	0.210449
-0.1918210845	0.4374627764	3449/16384	0.21051
-0.1910150874	0.4395830737	1725/8192	0.210571
-0.1914572258	0.4405000859	3451/16384	0.210632
-0.190950616	0.4413890086	431/2046	0.210655
-0.190537813	0.4406149172	863/4096	0.210693
-0.1896309141	0.4397259024	3453/16384	0.210754
-0.1890762988	0.4397149557	425/2016	0.210813
-0.1890185063	0.4396765464	1727/8192	0.210815
-0.1890310555	0.4388550078	431/2044	0.210861
-0.1892458424	0.4385963324	3455/16384	0.210876
-0.1897907822	0.4389846354	27/128	0.210938
-0.1897907822	0.4389846354	27/128	0.210938
-0.1904492152	0.4397147378	3457/16384	0.210999
-0.1913169212	0.4379106378	1729/8192	0.21106
-0.1904862104	0.437463803	3459/16384	0.211121
-0.1904152974	0.4374975236	429/2032	0.211122
-0.1880850005	0.4367433357	865/4096	0.211182
-0.1883544939	0.4367769213	419/1984	0.21119
-0.1874380947	0.4374213533	3461/16384	0.211243
-0.1877860491	0.4375252892	431/2040	0.211275
-0.1876607583	0.4379234417	1731/8192	0.211304
-0.1869785909	0.4398396591	3463/16384	0.211365
-0.1864721144	0.4402902489	433/2048	0.211426
-0.1861057866	0.4407204273	3465/16384	0.211487
-0.1860763929	0.4408275623	379/1792	0.211496
-0.1868471977	0.4412029268	1733/8192	0.211548
-0.1871076299	0.4410207152	325/1536	0.211589
-0.1871699866	0.4409112192	3467/16384	0.211609
-0.187512003	0.4408264754	433/2046	0.211632
-0.1874630621	0.4412244265	867/4096	0.21167
-0.1870289067	0.4422214271	3469/16384	0.211731
-0.1887552638	0.4435742342	1735/8192	0.211792
-0.1883471757	0.4439838824	61/288	0.211806
-0.189200784	0.4444632459	433/2044	0.21184
-0.1891971753	0.4446428423	3471/16384	0.211853
-0.1887154971	0.4447255985	217/1024	0.211914
-0.1887154971	0.4447255985	217/1024	0.211914
-0.1880832538	0.4450108586	3473/16384	0.211975
-0.1879724874	0.4450060654	407/1920	0.211979
-0.1887340465	0.4456879507	1737/8192	0.212036
-0.1890902693	0.4455183166	3475/16384	0.212097
-0.189094226	0.445655347	431/2032	0.212106
-0.1903442306	0.4454755316	869/4096	0.212158
-0.1907090474	0.4453791526	421/1984	0.212198
-0.1906331938	0.4448973135	3477/16384	0.212219
-0.1903716023	0.4448284402	433/2040	0.212255
-0.1903622266	0.4446551868	1739/8192	0.21228
-0.1910027384	0.4438883185	3479/16384	0.212341
-0.1911643683	0.4446608671	435/2048	0.212402
-0.1908058064	0.4453455868	3481/16384	0.212463
-0.1918842404	0.4466381059	1741/8192	0.212524
-0.1935725997	0.4462277383	3483/16384	0.212585
-0.19708371	0.4452739429	145/682	0.21261
-0.1976406595	0.4486075886	871/4096	0.212646
-0.2001917078	0.4506574755	3485/16384	0.212708
-0.2013133386	0.4507918078	1743/8192	0.212769
-0.2005137546	0.4518891847	143/672	0.212798
-0.2007352236	0.452519855	435/2044	0.212818
-0.2005434602	0.4524090069	3487/16384	0.21283
-0.1998929332	0.451774614	109/512	0.212891
-0.1998929332	0.451774614	109/512	0.212891
-0.1985983469	0.4506495824	3489/16384	0.212952
-0.1983544798	0.4534248359	1745/8192	0.213013
-0.198107244	0.4535655424	409/1920	0.213021
-0.1991864977	0.4534262721	3491/16384	0.213074
-0.1993122789	0.454054496	433/2032	0.213091
-0.2012471519	0.4549692382	873/4096	0.213135
-0.2021380468	0.4544771745	3493/16384	0.213196
-0.2018117646	0.4538523979	29/136	0.213235
-0.2020363775	0.4539094514	1747/8192	0.213257
-0.206520434	0.4523860741	3495/16384	0.213318
-0.2079250982	0.4514070913	437/2048	0.213379
-0.2093689399	0.4505951172	3497/16384	0.21344
-0.2073293093	0.4482820501	1749/8192	0.213501
-0.2064289888	0.4491381191	3499/16384	0.213562
-0.2049111893	0.4494624093	437/2046	0.213587
-0.2057233057	0.4482456615	875/4096	0.213623
-0.2067440705	0.4454166512	3501/16384	0.213684
-0.2059034615	0.443313306	1751/8192	0.213745
-0.211202737	0.4426080935	431/2016	0.21379
-0.2135724241	0.4440261809	437/2044	0.213796
-0.2113233154	0.4450258509	3503/16384	0.213806
-0.208889626	0.4460666168	219/1024	0.213867
-0.208889626	0.4460666168	219/1024	0.213867
-0.2069196595	0.4475748373	3505/16384	0.213928
-0.209204872	0.4499574943	1753/8192	0.213989
-0.2103437066	0.449461367	3507/16384	0.21405
-0.2104004469	0.4498594448	137/640	0.214062
-0.2117083705	0.4503846281	435/2032	0.214075
-0.217685308	0.4545346042	877/4096	0.214111
-0.2234482655	0.453613831	3509/16384	0.214172
-0.222199441	0.4519722823	329/1536	0.214193
-0.2210080188	0.4496312042	425/1984	0.214214
-0.2198373295	0.4486281889	437/2040	0.214216
-0.2235513075	0.4497835494	1755/8192	0.214233
-0.2371144924	0.4588897363	3511/16384	0.214294
-0.2261379859	0.4585728793	439/2048	0.214355
-0.2195037286	0.4563283447	3513/16384	0.214417
-0.213057596	0.4618008473	1757/8192	0.214478
-0.2128524174	0.4660213736	3515/16384	0.214539
-0.2057831699	0.4652471209	439/2046	0.214565
-0.2095759917	0.4638018789	879/4096	0.2146
-0.2099946677	0.4591030425	3517/16384	0.214661
-0.2087787628	0.4579522203	1759/8192	0.214722
-0.2113824967	0.455478904	439/2044	0.214775
-0.2113571753	0.4563449812	433/2016	0.214782
-0.2114838419	0.4563178938	3519/16384	0.214783
-0.2117125156	0.4581937052	55/256	0.214844
-0.2117125156	0.4581937052	55/256	0.214844
-0.2113593364	0.461527859	3521/16384	0.214905
-0.2185147574	0.4577812025	1761/8192	0.214966
-0.2161392847	0.4562266949	3523/16384	0.215027
-0.2117083705	0.4503846281	437/2032	0.215059
-0.2104304753	0.4506199508	881/4096	0.215088
-0.2104004469	0.4498594448	413/1920	0.215104
-0.2090509402	0.4518327258	3525/16384	0.215149
-0.2099511709	0.4529453712	439/2040	0.215196
-0.2093073766	0.4527383788	1763/8192	0.21521
-0.2094354487	0.4523848585	427/1984	0.215222
-0.2039269592	0.4542830132	3527/16384	0.215271
-0.2028024918	0.4548368947	441/2048	0.215332
-0.2018326517	0.4551064586	3529/16384	0.215393
-0.2022735704	0.4568591366	1765/8192	0.215454
-0.2029588908	0.4568223853	331/1536	0.215495
-0.203193008	0.4566859546	3531/16384	0.215515
-0.2045019314	0.4573014927	147/682	0.215543
-0.2032760385	0.4575973602	883/4096	0.215576
-0.2011758729	0.4583401044	3533/16384	0.215637
-0.1967476773	0.4612052191	1767/8192	0.215698
-0.1949570169	0.4636291993	63/292	0.215753
-0.1950936856	0.4635492315	3535/16384	0.215759
-0.1946474749	0.4629427874	145/672	0.215774
-0.1947545563	0.462644809	221/1024	0.21582
-0.1947545563	0.462644809	221/1024	0.21582
-0.1940315813	0.4616262541	3537/16384	0.215881
-0.1928854975	0.462907746	1769/8192	0.215942
-0.1926789834	0.4631859838	387/1792	0.21596
-0.1934000974	0.4634938206	3539/16384	0.216003
-0.1931604386	0.4663067125	439/2032	0.216043
-0.1927910347	0.4664856665	885/4096	0.216064
-0.1944513637	0.4675204463	3541/16384	0.216125
-0.1944830785	0.4668368687	83/384	0.216146
-0.1954707019	0.4663821275	147/680	0.216176
-0.1951571123	0.4665948352	1771/8192	0.216187
-0.1965827244	0.467621892	429/1984	0.21623
-0.1975437273	0.4690024881	3543/16384	0.216248
-0.1948847776	0.4690427135	443/2048	0.216309
-0.1931635155	0.4675443855	3545/16384	0.21637
-0.1897832448	0.4684895953	1773/8192	0.216431
-0.1889601918	0.4713088925	3547/16384	0.216492
-0.1848033639	0.469431016	443/2046	0.21652
-0.1868072875	0.469266459	887/4096	0.216553
-0.1886125236	0.4663635086	3549/16384	0.216614
-0.1884880429	0.4650316405	1775/8192	0.216675
-0.1903745833	0.4656967046	443/2044	0.216732
-0.1902687262	0.4655607435	3551/16384	0.216736
-0.1902823702	0.4665383513	437/2016	0.216766
-0.1897622087	0.4663613541	111/512	0.216797
-0.1897622087	0.4663613541	111/512	0.216797
-0.188571111	0.4678605408	3553/16384	0.216858
-0.1922995319	0.4680468558	1777/8192	0.216919
-0.1917913396	0.4667358346	3555/16384	0.21698
-0.1926004286	0.4639465042	441/2032	0.217028
-0.1927829186	0.4638420783	889/4096	0.217041
-0.1926789834	0.4631859838	389/1792	0.217076
-0.1918170722	0.4632161217	3557/16384	0.217102
-0.1911478313	0.4635708928	443/2040	0.217157
-0.1912850467	0.4636136663	1779/8192	0.217163
-0.1914155415	0.463206391	139/640	0.217188
-0.1907508207	0.460773092	3559/16384	0.217224
-0.189642394	0.4602513507	431/1984	0.217238
-0.1896939863	0.4599196336	445/2048	0.217285
-0.1894187285	0.4590859706	3561/16384	0.217346
-0.1879714068	0.4594553777	1781/8192	0.217407
-0.188084682	0.4603416856	3563/16384	0.217468
-0.1872697854	0.4611484574	445/2046	0.217498
-0.1872205213	0.4603939517	891/4096	0.217529
-0.1867239072	0.4587041346	3565/16384	0.21759
-0.1858772398	0.4578394469	1783/8192	0.217651
-0.1877421584	0.4575282881	445/2044	0.21771
-0.1878045534	0.4574608492	3567/16384	0.217712
-0.1875774453	0.4584872254	439/2016	0.217758
-0.187534673	0.458250889	223/1024	0.217773
-0.187534673	0.458250889	223/1024	0.217773
-0.1873329712	0.459392002	3569/16384	0.217834
-0.1889659957	0.4591004983	1785/8192	0.217896
-0.1889302498	0.4584110406	3571/16384	0.217957
-0.1904692587	0.4570496598	443/2032	0.218012
-0.1904230185	0.4570653279	893/4096	0.218018
-0.1903708689	0.4560359985	3573/16384	0.218079
-0.1900224672	0.4561594691	335/1536	0.218099
-0.1897894083	0.4558553009	89/408	0.218137
-0.1897143424	0.4558228764	1787/8192	0.21814
-0.1908635451	0.454390591	3575/16384	0.218201
-0.1914899208	0.4556337477	419/1920	0.218229
-0.1910635913	0.4557788898	433/1984	0.218246
-0.1910063981	0.455534196	447/2048	0.218262
-0.1907827477	0.4565410977	3577/16384	0.218323
-0.1922007462	0.4571462569	1789/8192	0.218384
-0.1929241927	0.4565779682	3579/16384	0.218445
-0.1940195353	0.457268751	149/682	0.218475
-0.1932010951	0.4574094396	895/4096	0.218506
-0.1922617844	0.458203181	3581/16384	0.218567
-0.1921581228	0.4587699198	1791/8192	0.218628
-0.1913637415	0.4582921888	3583/16384	0.218689
-0.1913664521	0.4582871235	447/2044	0.218689
-0.1917508699	0.4580030496	7/32	0.21875
-0.1917508699	0.4580030496	7/32	0.21875
-0.1924367696	0.4575861652	3585/16384	0.218811
-0.1911893295	0.4567735335	1793/8192	0.218872
-0.1909219179	0.4573582116	3587/16384	0.218933
-0.1895216682	0.4585146923	897/4096	0.218994
-0.1895203885	0.4585804346	445/2032	0.218996
-0.1899039195	0.4593039875	3589/16384	0.219055
-0.1903848675	0.4591956184	1795/8192	0.219116
-0.190389505	0.4592281511	149/680	0.219118
-0.1904488283	0.4617523277	3591/16384	0.219177
-0.1917809956	0.4624619631	449/2048	0.219238
-0.1913705014	0.4621707968	435/1984	0.219254
-0.1914155415	0.463206391	421/1920	0.219271
-0.192487666	0.463210478	3593/16384	0.219299
-0.1926789834	0.4631859838	393/1792	0.219308
-0.1935962642	0.4619901576	1797/8192	0.21936
-0.1932229078	0.4615326377	337/1536	0.219401
-0.1930250129	0.461429504	3595/16384	0.219421
-0.1931075257	0.4605446555	449/2046	0.219453
-0.1935373359	0.4609860965	899/4096	0.219482
-0.1950575701	0.4616481628	3597/16384	0.219543
-0.1996807773	0.4595772988	1799/8192	0.219604
-0.1999630529	0.4567460642	3599/16384	0.219666
-0.1998212709	0.4566234808	449/2044	0.219667
-0.2008074866	0.4572071913	225/1024	0.219727
-0.2008074866	0.4572071913	225/1024	0.219727
-0.2003133334	0.4570832888	443/2016	0.219742
-0.2022300801	0.4574748819	3601/16384	0.219788
-0.201830338	0.4555220095	1801/8192	0.219849
-0.201134202	0.4555758665	3603/16384	0.21991
-0.1990325023	0.4540982385	901/4096	0.219971
-0.1993122789	0.454054496	447/2032	0.21998
-0.1980885293	0.4546903319	3605/16384	0.220032
-0.1982561787	0.4552816592	1803/8192	0.220093
-0.1984155318	0.4553114882	449/2040	0.220098
-0.1966406782	0.4554322422	3607/16384	0.220154
-0.1972695078	0.4544768314	451/2048	0.220215
-0.1978678487	0.4546949559	437/1984	0.220262
-0.1983446205	0.453957963	3609/16384	0.220276
-0.198107244	0.4535655424	141/640	0.220312
-0.1979359687	0.4514462443	1805/8192	0.220337
-0.1957751238	0.4512198194	3611/16384	0.220398
-0.1925780002	0.4506049287	41/186	0.22043
-0.1925223748	0.4486132319	903/4096	0.220459
-0.1907382373	0.4476845186	3613/16384	0.22052
-0.1901169087	0.4478074354	1807/8192	0.220581
-0.1901089755	0.4468745361	3615/16384	0.220642
-0.1900582347	0.4470036658	451/2044	0.220646
-0.1906076953	0.4470045584	113/512	0.220703
-0.1906076953	0.4470045584	113/512	0.220703
-0.1904958488	0.4474765776	445/2016	0.220734
-0.1915802528	0.4473286013	3617/16384	0.220764
-0.1909401306	0.4456951441	1809/8192	0.220825
-0.19045008	0.4459255587	3619/16384	0.220886
-0.1891711412	0.4458871489	905/4096	0.220947
-0.189094226	0.445655347	449/2032	0.220965
-0.188838165	0.4463065151	3621/16384	0.221008
-0.1890116981	0.4465953415	1811/8192	0.221069
-0.1890232446	0.4464453393	451/2040	0.221078
-0.18818298	0.4478111345	3623/16384	0.22113
-0.1875653566	0.4482587925	453/2048	0.221191
-0.1870697511	0.4486894082	3625/16384	0.221252
-0.187264705	0.4488488726	439/1984	0.22127
-0.1879165741	0.4493466225	1813/8192	0.221313
-0.1882031667	0.4491179335	85/384	0.221354
-0.1882671008	0.4489943221	3627/16384	0.221375
-0.1887134973	0.4489556774	151/682	0.221408
-0.1885760949	0.4493133961	907/4096	0.221436
-0.1882931473	0.4502710881	3629/16384	0.221497
-0.1885811353	0.4510186927	1815/8192	0.221558
-0.1870381754	0.4507340923	3631/16384	0.221619
-0.187199892	0.450830455	453/2044	0.221624
-0.1875812369	0.4502483887	227/1024	0.22168
-0.1875812369	0.4502483887	227/1024	0.22168
-0.1880201007	0.4503055263	149/672	0.221726
-0.1881322181	0.4496686591	3633/16384	0.221741
-0.1872020141	0.4490282412	1817/8192	0.221802
-0.1867262664	0.4493562881	3635/16384	0.221863
-0.1844565945	0.4490460372	909/4096	0.221924
-0.1842484103	0.4483598153	451/2032	0.221949
-0.1827962909	0.4508869607	3637/16384	0.221985
-0.1837041705	0.4508991985	341/1536	0.222005
-0.1840642054	0.451686707	1819/8192	0.222046
-0.1836029016	0.4514032116	151/680	0.222059
-0.1824833962	0.4539867789	3639/16384	0.222107
-0.1817044951	0.4524991095	455/2048	0.222168
-0.1803569607	0.4505786883	3641/16384	0.222229
-0.1791649582	0.4524878737	441/1984	0.222278
-0.17898963	0.4524609233	1821/8192	0.22229
-0.1791328055	0.4534091634	3643/16384	0.222351
-0.1783748903	0.4536559716	455/2046	0.222385
-0.1781380955	0.453182468	427/1920	0.222396
-0.1783670149	0.4532857391	911/4096	0.222412
-0.1779306484	0.4524323343	3645/16384	0.222473
-0.1774360159	0.4523037511	1823/8192	0.222534
-0.177754881	0.4516024666	3647/16384	0.222595
-0.1777970013	0.4517785013	65/292	0.222603
-0.1780789223	0.4519179357	57/256	0.222656
-0.1780789223	0.4519179357	57/256	0.222656
-0.1783978162	0.4525450983	3649/16384	0.222717
-0.1784050848	0.4525007084	449/2016	0.222718
-0.1795139055	0.4513713993	1825/8192	0.222778
-0.1786219205	0.4508797812	3651/16384	0.222839
-0.177175084	0.4500875963	913/4096	0.2229
-0.1766750255	0.4498921443	453/2032	0.222933
-0.1765944609	0.4505676303	3653/16384	0.222961
-0.1767690926	0.4509945246	1827/8192	0.223022
-0.1765824077	0.4507524527	91/408	0.223039
-0.1760176371	0.4518428675	3655/16384	0.223083
-0.1752228546	0.4519874766	457/2048	0.223145
-0.1746560273	0.4523283124	3657/16384	0.223206
-0.1752470018	0.4530923971	1829/8192	0.223267
-0.1754639753	0.4532433416	443/1984	0.223286
-0.1756170883	0.4529579452	343/1536	0.223307
-0.1757169601	0.4528518825	3659/16384	0.223328
-0.1760644531	0.4530365348	457/2046	0.223363
-0.1759493633	0.4532226491	915/4096	0.223389
-0.1755909751	0.4535261719	143/640	0.223438
-0.1755057603	0.4541507325	3661/16384	0.22345
-0.1763467022	0.4549598432	1831/8192	0.223511
-0.1763127569	0.4563042697	3663/16384	0.223572
-0.1760727014	0.4562470862	457/2044	0.223581
-0.1757150291	0.45639681	229/1024	0.223633
-0.1757150291	0.45639681	229/1024	0.223633
-0.1748936134	0.4568044716	3665/16384	0.223694
-0.175176248	0.4571011765	451/2016	0.22371
-0.1757607411	0.4576689902	1833/8192	0.223755
-0.176033206	0.4578824618	401/1792	0.223772
-0.1762608417	0.4572948937	3667/16384	0.223816
-0.1775276509	0.4573426229	917/4096	0.223877
-0.1778539688	0.4571614152	455/2032	0.223917
-0.1778300172	0.4567048713	3669/16384	0.223938
-0.177525734	0.4564343716	1835/8192	0.223999
-0.1777442544	0.4564631351	457/2040	0.22402
-0.1781562887	0.4558225301	3671/16384	0.22406
-0.1782568827	0.4564422828	459/2048	0.224121
-0.1779733287	0.4570354102	3673/16384	0.224182
-0.1789544132	0.4577311576	1837/8192	0.224243
-0.1794517983	0.4571496459	445/1984	0.224294
-0.1797425132	0.4571719085	3675/16384	0.224304
-0.1807520099	0.4578540698	153/682	0.22434
-0.1801447182	0.4580922133	919/4096	0.224365
-0.178897117	0.4588838536	3677/16384	0.224426
-0.1782750626	0.4594424194	431/1920	0.224479
-0.1784557818	0.4595513267	1839/8192	0.224487
-0.1779080471	0.4586718478	3679/16384	0.224548
-0.1780771597	0.4586507114	459/2044	0.22456
-0.178370608	0.4585422579	115/512	0.224609
-0.178370608	0.4585422579	115/512	0.224609
-0.1791674568	0.4583260581	3681/16384	0.22467
-0.1787726391	0.4581246816	151/672	0.224702
-0.178273415	0.4573674606	1841/8192	0.224731
-0.1778472336	0.4577659895	3683/16384	0.224792
-0.1765745107	0.4577656214	921/4096	0.224854
-0.176033206	0.4578824618	403/1792	0.224888
-0.1761763361	0.4580017521	457/2032	0.224902
-0.1761861324	0.4584970584	3685/16384	0.224915
-0.1766245421	0.4588360624	1843/8192	0.224976
-0.176282774	0.4589017525	9/40	0.225
-0.1760422351	0.4602230791	3687/16384	0.225037
-0.1743156954	0.4609026804	461/2048	0.225098
-0.1731376677	0.4618722583	3689/16384	0.225159
-0.1749241207	0.463532896	1845/8192	0.22522
-0.1759001521	0.4625587256	3691/16384	0.225281
-0.1765906094	0.4623963144	447/1984	0.225302
-0.1771423221	0.4628946027	461/2046	0.225318
-0.176717861	0.4633152673	923/4096	0.225342
-0.1757358165	0.4654616922	3693/16384	0.225403
-0.1762079514	0.4673775284	1847/8192	0.225464
-0.1733880155	0.4660177174	433/1920	0.225521
-0.1734038309	0.4662651926	3695/16384	0.225525
-0.1738103676	0.465736679	461/2044	0.225538
-0.1743994722	0.4654623486	231/1024	0.225586
-0.1743994722	0.4654623486	231/1024	0.225586
-0.1757449057	0.4643639558	3697/16384	0.225647
-0.1743155042	0.4637671805	65/288	0.225694
-0.1738043882	0.4628062698	1849/8192	0.225708
-0.1726746772	0.4638864969	3699/16384	0.225769
-0.1682048142	0.4646898795	925/4096	0.22583
-0.1685119042	0.4666055186	459/2032	0.225886
-0.1684090129	0.4668319923	3701/16384	0.225891
-0.1691541273	0.4666991534	347/1536	0.225911
-0.1695711144	0.467385334	1851/8192	0.225952
-0.1684653892	0.4680623936	461/2040	0.22598
-0.1677998179	0.468799906	3703/16384	0.226013
-0.1677399273	0.4675982284	463/2048	0.226074
-0.1680456862	0.4662537098	3705/16384	0.226135
-0.166283864	0.4661430682	1853/8192	0.226196
-0.1658252977	0.4670513997	3707/16384	0.226257
-0.1651494427	0.4665656031	463/2046	0.226295
-0.1653496307	0.4664620085	449/1984	0.22631
-0.1652955794	0.466550278	927/4096	0.226318
-0.1655243462	0.4656757929	3709/16384	0.226379
-0.165103584	0.465286474	1855/8192	0.22644
-0.1657906959	0.4649038953	3711/16384	0.226501
-0.1658895695	0.4652084833	463/2044	0.226517
-0.1658428212	0.4653409416	29/128	0.226562
-0.1658428212	0.4653409416	29/128	0.226562
-0.1656268363	0.4659627456	3713/16384	0.226624
-0.1669893799	0.4661890717	1857/8192	0.226685
-0.16691984	0.4660755549	457/2016	0.226687
-0.1669043192	0.4650723801	3715/16384	0.226746
-0.1665141043	0.4618122978	929/4096	0.226807
-0.1648930139	0.4628169486	3717/16384	0.226868
-0.164698589	0.4627261363	461/2032	0.22687
-0.1651345417	0.4636496213	1859/8192	0.226929
-0.1642599006	0.4634447861	463/2040	0.226961
-0.1640860435	0.4641807337	3719/16384	0.22699
-0.1628667996	0.4637031099	465/2048	0.227051
-0.1621096288	0.4641721623	3721/16384	0.227112
-0.1621043848	0.4644582115	407/1792	0.227121
-0.162564879	0.4651582125	1861/8192	0.227173
-0.1631142184	0.4650882667	349/1536	0.227214
-0.1632724999	0.4649970167	3723/16384	0.227234
-0.1634794685	0.4654873567	5/22	0.227273
-0.1633913502	0.4654601511	931/4096	0.227295
-0.1632555377	0.4653317893	451/1984	0.227319
-0.1627422559	0.4660592683	3725/16384	0.227356
-0.16308822	0.4668084252	1863/8192	0.227417
-0.1620086096	0.4675683508	3727/16384	0.227478
-0.1612860078	0.4675040364	465/2044	0.227495
-0.1611076023	0.4673731263	233/1024	0.227539
-0.1611076023	0.4673731263	233/1024	0.227539
-0.1601632241	0.4675910909	3729/16384	0.2276
-0.1599670501	0.4676918702	437/1920	0.227604
-0.1605410157	0.4687847886	1865/8192	0.227661
-0.1609070697	0.4691525276	51/224	0.227679
-0.1613984889	0.468542358	3731/16384	0.227722
-0.1623348506	0.4696421491	933/4096	0.227783
-0.1631926435	0.4690891468	3733/16384	0.227844
-0.1631589165	0.4689101641	463/2032	0.227854
-0.1630027047	0.4685616681	1867/8192	0.227905
-0.1636309948	0.4686516009	31/136	0.227941
-0.1639124102	0.4684079302	3735/16384	0.227966
-0.1636901456	0.4689929263	467/2048	0.228027
-0.1630295896	0.4693551453	3737/16384	0.228088
-0.1635245415	0.4705678592	1869/8192	0.228149
-0.1646735433	0.4702366868	3739/16384	0.22821
-0.1650412608	0.4714437594	467/2046	0.22825
-0.1648402211	0.4712153119	935/4096	0.228271
-0.1638568163	0.4717068234	453/1984	0.228327
-0.1632196197	0.4717809969	3741/16384	0.228333
-0.1636985977	0.4740443849	1871/8192	0.228394
-0.1629347585	0.4753630027	3743/16384	0.228455
-0.1624413026	0.4753477211	467/2044	0.228474
-0.1624122343	0.4750801466	117/512	0.228516
-0.1624122343	0.4750801466	117/512	0.228516
-0.1613377271	0.474641593	3745/16384	0.228577
-0.1613383369	0.4762560281	1873/8192	0.228638
-0.1611897964	0.4765247154	439/1920	0.228646
-0.1621648017	0.4764967602	461/2016	0.228671
-0.1622569244	0.4761230559	3747/16384	0.228699
-0.1631439139	0.4778141636	937/4096	0.22876
-0.1643662491	0.4770795198	3749/16384	0.228821
-0.1639784428	0.476646689	465/2032	0.228839
-0.1640516241	0.4763769008	1875/8192	0.228882
-0.1649435962	0.4761032111	467/2040	0.228922
-0.1652738436	0.4759771556	3751/16384	0.228943
-0.1673515244	0.4770632394	469/2048	0.229004
-0.1684267597	0.4765613286	3753/16384	0.229065
-0.1679412242	0.4749981498	1877/8192	0.229126
-0.1669022061	0.4751562461	3755/16384	0.229187
-0.1667429275	0.4741764966	469/2046	0.229228
-0.1669029529	0.4744084569	939/4096	0.229248
-0.1681343084	0.4739270599	3757/16384	0.229309
-0.1675550053	0.4734648334	455/1984	0.229335
-0.1683369533	0.4728770595	1879/8192	0.22937
-0.1694515602	0.4741664582	3759/16384	0.229431
-0.1690047164	0.4744668181	67/292	0.229452
-0.1687170533	0.4742503722	235/1024	0.229492
-0.1687170533	0.4742503722	235/1024	0.229492
-0.1676952627	0.4742741496	3761/16384	0.229553
-0.1680259294	0.4758569503	1881/8192	0.229614
-0.1688045221	0.4755709724	463/2016	0.229663
-0.1690015595	0.4755060582	3763/16384	0.229675
-0.1691047622	0.4757183026	147/640	0.229687
-0.1704451155	0.4776236222	941/4096	0.229736
-0.172557731	0.4771434685	3765/16384	0.229797
-0.1719695293	0.4764149614	353/1536	0.229818
-0.171636628	0.4764927837	467/2032	0.229823
-0.1723499036	0.4755801268	1883/8192	0.229858
-0.1741056387	0.4753256762	469/2040	0.229902
-0.1761885248	0.4763100156	3767/16384	0.229919
-0.1739343263	0.4778472792	471/2048	0.22998
-0.17164392	0.477735675	3769/16384	0.230042
-0.1704003397	0.4799647912	1885/8192	0.230103
-0.1713275982	0.4820403197	3771/16384	0.230164
-0.1686310817	0.4816356993	157/682	0.230205
-0.1693829383	0.4817236407	943/4096	0.230225
-0.1691547205	0.4798538724	3773/16384	0.230286
-0.168494538	0.4795564623	457/1984	0.230343
-0.1684130286	0.4795591217	1887/8192	0.230347
-0.1691735717	0.4788820253	3775/16384	0.230408
-0.1695419314	0.4790401726	471/2044	0.230431
-0.1693991685	0.4793542242	59/256	0.230469
-0.1693991685	0.4793542242	59/256	0.230469
-0.1695046499	0.4804605357	3777/16384	0.23053
-0.1715871926	0.4789847841	1889/8192	0.230591
-0.1702689873	0.4785093202	3779/16384	0.230652
-0.1702812078	0.478571129	155/672	0.230655
-0.1692689605	0.4762835137	945/4096	0.230713
-0.1691047622	0.4757183026	443/1920	0.230729
-0.1680871179	0.4770148794	3781/16384	0.230774
-0.1685813684	0.4773246336	469/2032	0.230807
-0.1683582949	0.4776961269	1891/8192	0.230835
-0.1675913875	0.4779904628	157/680	0.230882
-0.1671818578	0.4780404053	3783/16384	0.230896
-0.1651087266	0.4769934959	473/2048	0.230957
-0.1640008349	0.4774990273	3785/16384	0.231018
-0.1644678393	0.4792001118	1893/8192	0.231079
-0.1653430737	0.479059867	355/1536	0.23112
-0.1656254314	0.4789223711	3787/16384	0.23114
-0.1659190598	0.4800377864	43/186	0.231183
-0.1657187766	0.479712447	947/4096	0.231201
-0.1643193783	0.480445761	3789/16384	0.231262
-0.1644117867	0.4817906563	1895/8192	0.231323
-0.1637142818	0.4811372422	459/1984	0.231351
-0.1606897095	0.4811193925	3791/16384	0.231384
-0.1595554062	0.481158977	473/2044	0.231409
-0.159635618	0.4807070196	237/1024	0.231445
-0.159635618	0.4807070196	237/1024	0.231445
-0.1587492538	0.4801196147	3793/16384	0.231506
-0.157669111	0.4813859563	1897/8192	0.231567
-0.1576626057	0.4821264956	415/1792	0.231585
-0.1589226508	0.4820610509	3795/16384	0.231628
-0.1589919253	0.4828420921	467/2016	0.231647
-0.1575032745	0.4853052194	949/4096	0.231689
-0.1602926202	0.4866094416	3797/16384	0.23175
-0.1601739988	0.4853783122	89/384	0.231771
-0.1606503342	0.4845486391	471/2032	0.231791
-0.1610945238	0.4849874384	1899/8192	0.231812
-0.1637335836	0.4857777398	473/2040	0.231863
-0.163689783	0.4870504519	3799/16384	0.231873
-0.1612928679	0.4878097103	475/2048	0.231934
-0.1588858292	0.4862141194	3801/16384	0.231995
-0.155500718	0.4878306899	1901/8192	0.232056
-0.1562149335	0.4924145617	3803/16384	0.232117
-0.1510848028	0.4889277459	475/2046	0.23216
-0.1519679203	0.4908746339	951/4096	0.232178
-0.1538823723	0.4866083256	3805/16384	0.232239
-0.1530819181	0.4849663659	1903/8192	0.2323
-0.1549699992	0.4854040258	461/1984	0.232359
-0.1549997311	0.4853455229	3807/16384	0.232361
-0.1553415555	0.4862983166	475/2044	0.232387
-0.154694671	0.4861759126	119/512	0.232422
-0.154694671	0.4861759126	119/512	0.232422
-0.1532558329	0.488098129	3809/16384	0.232483
-0.1581103972	0.4880937423	1905/8192	0.232544
-0.1565543446	0.4861452788	3811/16384	0.232605
-0.1567801887	0.4851101837	67/288	0.232639
-0.1585039151	0.4830259145	953/4096	0.232666
-0.1576626057	0.4821264956	417/1792	0.232701
-0.1565264874	0.4822773169	3813/16384	0.232727
-0.1558230101	0.483577493	473/2032	0.232776
-0.1558581826	0.4832317592	1907/8192	0.232788
-0.1558535952	0.4827454985	149/640	0.232813
-0.154465055	0.4818073894	95/408	0.232843
-0.154769002	0.4818574027	3815/16384	0.232849
-0.1562295836	0.4792919476	477/2048	0.23291
-0.1559037105	0.4783325296	3817/16384	0.232971
-0.154327942	0.4780403284	1909/8192	0.233032
-0.1538552804	0.4795917909	3819/16384	0.233093
-0.1523072841	0.478659764	159/682	0.233138
-0.1526724382	0.4790708221	955/4096	0.233154
-0.1535476436	0.4771574633	3821/16384	0.233215
-0.1530629594	0.4757499071	1911/8192	0.233276
-0.1546543069	0.4764867818	3823/16384	0.233337
-0.154415129	0.4771385639	477/2044	0.233366
-0.1544329415	0.4770904919	463/1984	0.233367
-0.1541821622	0.4769555949	239/1024	0.233398
-0.1541821622	0.4769555949	239/1024	0.233398
-0.1531511581	0.4778055443	3825/16384	0.233459
-0.1550425382	0.4786469762	1913/8192	0.233521
-0.1551761734	0.4774985573	3827/16384	0.233582
-0.1566968738	0.4775677381	157/672	0.233631
-0.1567484915	0.4775907637	957/4096	0.233643
-0.1570931342	0.4766725228	3829/16384	0.233704
-0.1566477836	0.4766098006	359/1536	0.233724
-0.1566476433	0.4761448947	475/2032	0.23376
-0.1565533176	0.4761911208	1915/8192	0.233765
-0.1577237477	0.4758926647	159/680	0.233824
-0.1577632622	0.4758007129	3831/16384	0.233826
-0.1577432356	0.476601919	449/1920	0.233854
-0.1575152789	0.4764581203	479/2048	0.233887
-0.1569547453	0.477018925	3833/16384	0.233948
-0.1576027968	0.4776779077	1917/8192	0.234009
-0.1582514212	0.4773926205	3835/16384	0.23407
-0.1582443714	0.4780841509	479/2046	0.234115
-0.1582630208	0.477922218	959/4096	0.234131
-0.1576441115	0.4781100122	3837/16384	0.234192
-0.1575781083	0.4784680163	1919/8192	0.234253
-0.1572498699	0.4781661269	3839/16384	0.234314
-0.1573704352	0.4779798153	479/2044	0.234344
-0.1574376248	0.478062727	15/64	0.234375
-0.1574376248	0.478062727	15/64	0.234375
-0.1578494992	0.4780075772	3841/16384	0.234436
-0.1574916879	0.4772555391	1921/8192	0.234497
-0.1571275746	0.4777204766	3843/16384	0.234558
-0.1558413079	0.4775654205	961/4096	0.234619
-0.1559808273	0.4775600129	473/2016	0.234623
-0.1560999748	0.4787351484	3845/16384	0.23468
-0.1566357483	0.4785536437	1923/8192	0.234741
-0.1566596442	0.4785512064	477/2032	0.234744
-0.1568861877	0.4792585412	3847/16384	0.234802
-0.1569233789	0.4792585711	479/2040	0.234804
-0.1559441133	0.481565971	481/2048	0.234863
-0.1558535952	0.4827454985	451/1920	0.234896
-0.1573332771	0.4825417792	3849/16384	0.234924
-0.1576626057	0.4821264956	421/1792	0.234933
-0.1585413418	0.4808924413	1925/8192	0.234985
-0.1579305007	0.4803189846	361/1536	0.235026
-0.1577194607	0.480148836	3851/16384	0.235046
-0.1583653688	0.479657472	481/2046	0.235093
-0.1582129829	0.4798095262	963/4096	0.235107
-0.159261398	0.4802017087	3853/16384	0.235168
-0.1596621835	0.4793994418	1927/8192	0.235229
-0.1623610929	0.480132462	3855/16384	0.235291
-0.1633225429	0.4796824939	481/2044	0.235323
-0.1635756777	0.4801210222	241/1024	0.235352
-0.1635756777	0.4801210222	241/1024	0.235352
-0.1637142818	0.4811372422	467/1984	0.235383
-0.1648958702	0.4799986782	3857/16384	0.235413
-0.1644684044	0.4782416698	1929/8192	0.235474
-0.1633790073	0.47860395	3859/16384	0.235535
-0.1623948554	0.4767659674	965/4096	0.235596
-0.1621648017	0.4764967602	475/2016	0.235615
-0.1612474628	0.4771726211	3861/16384	0.235657
-0.1612610524	0.4778645561	1931/8192	0.235718
-0.1613764222	0.4777500405	479/2032	0.235728
-0.1602466698	0.4774900886	3863/16384	0.235779
-0.1603426298	0.4775445952	481/2040	0.235784
-0.1607437262	0.4770625654	483/2048	0.23584
-0.1616286394	0.4769466492	3865/16384	0.235901
-0.1611897964	0.4765247154	151/640	0.235937
-0.1614899054	0.4755427629	1933/8192	0.235962
-0.1603158964	0.4756078857	3867/16384	0.236023
-0.1603544088	0.4744601713	161/682	0.23607
-0.160387422	0.4747227625	967/4096	0.236084
-0.1619813296	0.4744813795	3869/16384	0.236145
-0.1615923511	0.4723212894	1935/8192	0.236206
-0.1621467714	0.4710587141	3871/16384	0.236267
-0.1625955357	0.4710466609	69/292	0.236301
-0.1626817177	0.4712348162	121/512	0.236328
-0.1626817177	0.4712348162	121/512	0.236328
-0.1637989331	0.4714755129	3873/16384	0.236389
-0.1638568163	0.4717068234	469/1984	0.236391
-0.1633973148	0.4699480039	1937/8192	0.23645
-0.1626028126	0.4702266346	3875/16384	0.236511
-0.1616693652	0.4691651693	969/4096	0.236572
-0.1609070697	0.4691525276	53/224	0.236607
-0.1607203168	0.4697759449	3877/16384	0.236633
-0.1610387492	0.4703700322	1939/8192	0.236694
-0.1607780918	0.4701258707	481/2032	0.236713
-0.1601305593	0.4708679737	3879/16384	0.236755
-0.1601503271	0.4705486235	161/680	0.236765
-0.1587628182	0.469944453	485/2048	0.236816
-0.1578472684	0.4703764037	3881/16384	0.236877
-0.1581881266	0.4715696723	1941/8192	0.236938
-0.1588271531	0.4715748434	91/384	0.236979
-0.1590367987	0.4715163298	3883/16384	0.237
-0.1590348232	0.4722090292	485/2046	0.237048
-0.1590114946	0.4720703272	971/4096	0.237061
-0.1581126219	0.4723281096	3885/16384	0.237122
-0.1579374032	0.4731035582	1943/8192	0.237183
-0.1572279028	0.4722456687	3887/16384	0.237244
-0.1576380584	0.4720303915	485/2044	0.23728
-0.1577007486	0.4721636352	243/1024	0.237305
-0.1577007486	0.4721636352	243/1024	0.237305
-0.1584158613	0.4721951645	3889/16384	0.237366
-0.1580799609	0.4718896947	471/1984	0.237399
-0.1582432749	0.4710708586	1945/8192	0.237427
-0.157427837	0.4713426343	3891/16384	0.237488
-0.1565527227	0.470086675	973/4096	0.237549
-0.1558258247	0.470480926	479/2016	0.237599
-0.1552513152	0.4706298431	3893/16384	0.23761
-0.1556692207	0.4710814208	365/1536	0.23763
-0.1554917635	0.4715718651	1947/8192	0.237671
-0.1550110156	0.4714905877	483/2032	0.237697
-0.1537922421	0.4713668808	3895/16384	0.237732
-0.1539649487	0.4708511271	97/408	0.237745
-0.1545252154	0.4706293776	487/2048	0.237793
-0.1556282478	0.4704330539	3897/16384	0.237854
-0.155492041	0.4688691117	1949/8192	0.237915
-0.1539903094	0.4687514445	3899/16384	0.237976
-0.1541644674	0.4674541782	457/1920	0.238021
-0.1541597475	0.4676261549	487/2046	0.238025
-0.1541160212	0.4677562533	975/4096	0.238037
-0.1556504281	0.4663639185	3901/16384	0.238098
-0.15465368	0.4658893015	1951/8192	0.238159
-0.1552146787	0.4653223075	3903/16384	0.23822
-0.1555620348	0.465552888	487/2044	0.238258
-0.1555179777	0.4656112164	61/256	0.238281
-0.1555179777	0.4656112164	61/256	0.238281
-0.1565882818	0.4665791012	3905/16384	0.238342
-0.1565504745	0.4648703399	1953/8192	0.238403
-0.1568131614	0.464888837	473/1984	0.238407
-0.1557374762	0.4648318441	3907/16384	0.238464
-0.155427946	0.4639494197	977/4096	0.238525
-0.1545785053	0.4640887817	3909/16384	0.238586
-0.154465611	0.4642002397	481/2016	0.238591
-0.154636524	0.4646302746	1955/8192	0.238647
-0.1541106058	0.4644720217	485/2032	0.238681
-0.1539452981	0.4648089982	3911/16384	0.238708
-0.1537597145	0.4643691601	487/2040	0.238725
-0.1535612697	0.4636878255	489/2048	0.23877
-0.1526394189	0.4635819944	3913/16384	0.238831
-0.1522472812	0.4646968	1957/8192	0.238892
-0.1528837005	0.4650258881	367/1536	0.238932
-0.1530677797	0.4650457113	3915/16384	0.238953
-0.1528847977	0.4655348393	163/682	0.239003
-0.1529244925	0.4654934466	979/4096	0.239014
-0.1525357536	0.4655209992	153/640	0.239063
-0.1520614052	0.4655749901	3917/16384	0.239075
-0.1519972452	0.4664063622	1959/8192	0.239136
-0.1509997628	0.4661618173	3919/16384	0.239197
-0.1501624799	0.4650418995	489/2044	0.239237
-0.150240662	0.4648926217	245/1024	0.239258
-0.150240662	0.4648926217	245/1024	0.239258
-0.1494653356	0.4646862004	3921/16384	0.239319
-0.1489176571	0.4655835399	1961/8192	0.23938
-0.1489423818	0.4662657445	429/1792	0.239397
-0.1495748144	0.4663542387	475/1984	0.239415
-0.1498421534	0.4662149401	3923/16384	0.239441
-0.1492413482	0.4675561716	981/4096	0.239502
-0.150411862	0.4680066992	3925/16384	0.239563
-0.1504486625	0.467534663	23/96	0.239583
-0.1507654188	0.4674370586	1963/8192	0.239624
-0.1511517421	0.4678152163	487/2032	0.239665
-0.1514495159	0.4680716853	3927/16384	0.239685
-0.1511467357	0.4684622149	163/680	0.239706
-0.1508340944	0.468276476	491/2048	0.239746
-0.150149996	0.467839677	3929/16384	0.239807
-0.1493609944	0.4688408749	1965/8192	0.239868
-0.1503803272	0.4698544194	3931/16384	0.239929
-0.1490993775	0.4704828341	491/2046	0.23998
-0.149390495	0.4705583115	983/4096	0.23999
-0.1485774642	0.4691900509	3933/16384	0.240051
-0.1476984871	0.4687784659	461/1920	0.240104
-0.1476307435	0.4689529472	1967/8192	0.240112
-0.1483753415	0.4683757191	3935/16384	0.240173
-0.148702455	0.4687390192	491/2044	0.240215
-0.1485677571	0.4687354649	123/512	0.240234
-0.1485677571	0.4687354649	123/512	0.240234
-0.1486826271	0.4696356285	3937/16384	0.240295
-0.1499207689	0.468742848	1969/8192	0.240356
-0.1491036305	0.4681634356	3939/16384	0.240417
-0.1491718609	0.4681629725	477/1984	0.240423
-0.1496576731	0.4669148824	985/4096	0.240479
-0.1489423818	0.4662657445	431/1792	0.240513
-0.1482878035	0.4664361457	3941/16384	0.24054
-0.1483171196	0.4672036753	485/2016	0.240575
-0.1480488314	0.4672689178	1971/8192	0.240601
-0.1472233428	0.4672652703	489/2032	0.24065
-0.1470123509	0.4670135333	3943/16384	0.240662
-0.1467300466	0.4662802515	491/2040	0.240686
-0.14765667	0.465051536	493/2048	0.240723
-0.1469506642	0.4643181658	3945/16384	0.240784
-0.1453727469	0.4645741596	1973/8192	0.240845
-0.1455872836	0.4662520175	3947/16384	0.240906
-0.1443363379	0.4662553615	493/2046	0.240958
-0.1445280899	0.4665080761	987/4096	0.240967
-0.1441357453	0.4645445784	3949/16384	0.241028
-0.1422353681	0.4636442966	1975/8192	0.241089
-0.1446131141	0.4630643887	463/1920	0.241146
-0.1444976559	0.4629577916	3951/16384	0.24115
-0.1445125232	0.4640448714	493/2044	0.241194
-0.1443866274	0.4638034655	247/1024	0.241211
-0.1443866274	0.4638034655	247/1024	0.241211
-0.1438827947	0.4652573086	3953/16384	0.241272
-0.1459341409	0.4651175912	1977/8192	0.241333
-0.1456963441	0.4636511475	3955/16384	0.241394
-0.1462524588	0.4630296242	479/1984	0.241431
-0.1471609476	0.4635292079	989/4096	0.241455
-0.1474448069	0.4623755906	3957/16384	0.241516
-0.1468267567	0.4622359251	371/1536	0.241536
-0.1464773158	0.4613201041	487/2016	0.241567
-0.146699037	0.4617193045	1979/8192	0.241577
-0.1482797395	0.4614988458	491/2032	0.241634
-0.1481336749	0.4613038559	3959/16384	0.241638
-0.1480918064	0.4621424293	29/120	0.241667
-0.1478369937	0.4620119929	495/2048	0.241699
-0.147167729	0.4625457156	3961/16384	0.24176
-0.1479266915	0.4631569128	1981/8192	0.241821
-0.148605299	0.4628307248	3963/16384	0.241882
-0.1485957717	0.4632987315	15/62	0.241935
-0.1486478493	0.4632760141	991/4096	0.241943
-0.1481763721	0.4634824008	3965/16384	0.242004
-0.14822775	0.4638432442	1983/8192	0.242065
-0.1478785126	0.4637169009	3967/16384	0.242126
-0.1479981131	0.4635139315	495/2044	0.242172
-0.1479902813	0.4635620432	31/128	0.242188
-0.1479902813	0.4635620432	31/128	0.242188
-0.1483183553	0.4634656952	3969/16384	0.242249
-0.1479891112	0.4628592973	1985/8192	0.24231
-0.1475980591	0.4634070402	3971/16384	0.242371
-0.1464656494	0.4632970594	993/4096	0.242432
-0.1462524588	0.4630296242	481/1984	0.24244
-0.1470353922	0.4646737967	3973/16384	0.242493
-0.1475509021	0.464248955	1987/8192	0.242554
-0.1475291735	0.4642144489	163/672	0.24256
-0.1480127089	0.4646330183	3975/16384	0.242615
-0.1479849446	0.4645931012	493/2032	0.242618
-0.1480789245	0.4650864931	33/136	0.242647
-0.1474351204	0.4662520327	497/2048	0.242676
-0.1486291135	0.4666552085	3977/16384	0.242737
-0.1489423818	0.4662657445	435/1792	0.242746
-0.14938498	0.4655134802	1989/8192	0.242798
-0.1488601912	0.4650118942	373/1536	0.242839
-0.148718816	0.4649180591	3979/16384	0.242859
-0.1490477829	0.4646335726	497/2046	0.242913
-0.1489876106	0.4646305661	995/4096	0.24292
-0.1496939976	0.4647785045	3981/16384	0.242981
-0.149816728	0.4641059277	1991/8192	0.243042
-0.1506170152	0.4643041619	3983/16384	0.243103
-0.1514624319	0.4653313095	71/292	0.243151
-0.1514221017	0.4654944994	249/1024	0.243164
-0.1514221017	0.4654944994	249/1024	0.243164
-0.1523274937	0.4655804114	3985/16384	0.243225
-0.1525357536	0.4655209992	467/1920	0.243229
-0.1525589957	0.4645033521	1993/8192	0.243286
-0.1516419552	0.4641245599	3987/16384	0.243347
-0.1519046518	0.4630008165	997/4096	0.243408
-0.1512458118	0.4627974154	483/1984	0.243448
-0.1508845693	0.4627679832	3989/16384	0.243469
-0.1506820234	0.4632617616	1995/8192	0.24353
-0.1506492359	0.4630986761	491/2016	0.243552
-0.15011686	0.4629080395	3991/16384	0.243591
-0.1502270452	0.4628233593	495/2032	0.243602
-0.1504230007	0.4625408792	497/2040	0.243627
-0.1505014372	0.4626700824	499/2048	0.243652
-0.1510402854	0.4628670053	3993/16384	0.243713
-0.151334924	0.4619369596	1997/8192	0.243774
-0.1503864886	0.4615889104	3995/16384	0.243835
-0.1507002725	0.4610216838	499/2046	0.243891
-0.1506426232	0.4610016063	999/4096	0.243896
-0.1515097039	0.4611294111	3997/16384	0.243958
-0.1517422005	0.460358094	1999/8192	0.244019
-0.1526206152	0.4605861961	3999/16384	0.24408
-0.1532376142	0.4612506831	499/2044	0.244129
-0.1531905342	0.461277499	125/512	0.244141
-0.1531905342	0.461277499	125/512	0.244141
-0.1538103741	0.4614627956	4001/16384	0.244202
-0.1540068615	0.4607536804	2001/8192	0.244263
-0.1541625482	0.4605768476	469/1920	0.244271
-0.1534588936	0.4603946927	4003/16384	0.244324
-0.1538201285	0.4597681642	1001/4096	0.244385
-0.1531528405	0.4590846414	4005/16384	0.244446
-0.1528955033	0.4592955795	485/1984	0.244456
-0.1527147848	0.4595502754	2003/8192	0.244507
-0.1523541117	0.4592043418	493/2016	0.244544
-0.1520994924	0.4592054308	4007/16384	0.244568
-0.1520903525	0.4588310456	497/2032	0.244587
-0.1522057807	0.4585215871	499/2040	0.244608
-0.1527887127	0.4583114619	501/2048	0.244629
-0.1521420979	0.4576780814	4009/16384	0.24469
-0.1512399074	0.4580246854	2005/8192	0.244751
-0.1514175356	0.4588126927	4011/16384	0.244812
-0.1510379421	0.4589215245	167/682	0.244868
-0.1510453735	0.4589629032	1003/4096	0.244873
-0.1506424018	0.4583939564	4013/16384	0.244934
-0.1497607418	0.4586964674	2007/8192	0.244995
-0.1501580972	0.45755696	4015/16384	0.245056
-0.1504964605	0.4580433133	501/2044	0.245108
-0.1504642477	0.457972411	251/1024	0.245117
-0.1504642477	0.457972411	251/1024	0.245117
-0.1506138144	0.4586048864	4017/16384	0.245178
-0.1514123895	0.4582560087	2009/8192	0.245239
-0.1510959176	0.4574070832	4019/16384	0.2453
-0.1511946508	0.4572551966	157/640	0.245312
-0.151988847	0.4570016366	1005/4096	0.245361
-0.1518947125	0.4556363431	4021/16384	0.245422
-0.1511435037	0.4558042988	377/1536	0.245443
-0.1507131169	0.4559823702	487/1984	0.245464
-0.1506797213	0.4554843045	2011/8192	0.245483
-0.151583026	0.453608448	4023/16384	0.245544
-0.152738533	0.4548176098	499/2032	0.245571
-0.1522002625	0.4550994265	167/680	0.245588
-0.1520340168	0.4548241141	503/2048	0.245605
-0.1516093119	0.4557925227	4025/16384	0.245667
-0.1526914975	0.4561839029	2013/8192	0.245728
-0.1537374609	0.4556366375	4027/16384	0.245789
-0.1537691943	0.4562767396	503/2046	0.245846
-0.1537921269	0.4563213144	1007/4096	0.24585
-0.1531976076	0.4565492419	4029/16384	0.245911
-0.1532529516	0.4570328219	2015/8192	0.245972
-0.1528437274	0.4569255094	4031/16384	0.246033
-0.152984056	0.4567143116	503/2044	0.246086
-0.152951063	0.4567222508	63/256	0.246094
-0.152951063	0.4567222508	63/256	0.246094
-0.1533173991	0.4566192431	4033/16384	0.246155
-0.15288268	0.4559144854	2017/8192	0.246216
-0.152436241	0.4566413863	4035/16384	0.246277
-0.1515347961	0.4567741678	1009/4096	0.246338
-0.1511946508	0.4572551966	473/1920	0.246354
-0.1520940596	0.4578619609	4037/16384	0.246399
-0.1525864016	0.4575162749	2019/8192	0.24646
-0.1525091433	0.4575470205	489/1984	0.246472
-0.1530514949	0.4578392387	4039/16384	0.246521
-0.1529628541	0.4578668442	71/288	0.246528
-0.1530643352	0.4582254526	501/2032	0.246555
-0.1529419077	0.45845199	503/2040	0.246569
-0.1524003169	0.4586697146	505/2048	0.246582
-0.1531614261	0.4592366999	4041/16384	0.246643
-0.1538787824	0.4587652982	2021/8192	0.246704
-0.1537376132	0.4582045728	379/1536	0.246745
-0.1536491696	0.4581106449	4043/16384	0.246765
-0.1539230734	0.457946411	505/2046	0.246823
-0.1539268796	0.4579253466	1011/4096	0.246826
-0.1543952692	0.458260069	4045/16384	0.246887
-0.1548691716	0.4577136632	2023/8192	0.246948
-0.1554194365	0.4581897787	4047/16384	0.247009
-0.1549425575	0.459033139	505/2044	0.247065
-0.154891827	0.4590253455	253/1024	0.24707
-0.154891827	0.4590253455	253/1024	0.24707
-0.1554020346	0.4594113778	4049/16384	0.247131
-0.1559121891	0.4591875825	2025/8192	0.247192
-0.1562733891	0.4589668771	443/1792	0.24721
-0.1559664989	0.4585912976	4051/16384	0.247253
-0.1565333534	0.4584949938	1013/4096	0.247314
-0.1566089781	0.4576344317	4053/16384	0.247375
-0.1562519369	0.4577165101	95/384	0.247396
-0.1560623448	0.4576017908	2027/8192	0.247437
-0.1559645451	0.4572337368	491/1984	0.24748
-0.1560144722	0.4568448209	4055/16384	0.247498
-0.1566103382	0.4565957167	499/2016	0.24752
-0.1567101191	0.4571557786	503/2032	0.247539
-0.1565533026	0.4572266147	101/408	0.247549
-0.1565275526	0.4571423031	507/2048	0.247559
-0.1564919529	0.4576558778	4057/16384	0.24762
-0.1572250009	0.4578053242	2029/8192	0.247681
-0.1580334602	0.4569726411	4059/16384	0.247742
-0.1585825748	0.4576457628	169/682	0.247801
-0.1585577992	0.4577078096	1015/4096	0.247803
-0.1578725309	0.4581859364	4061/16384	0.247864
-0.1578176135	0.4588518709	2031/8192	0.247925
-0.1573697785	0.4586018444	4063/16384	0.247986
-0.1575313279	0.4584233956	507/2044	0.248043
-0.1575253955	0.4584037266	127/512	0.248047
-0.1575253955	0.4584037266	127/512	0.248047
-0.1579251435	0.4583173787	4065/16384	0.248108
-0.1574076723	0.4576828806	2033/8192	0.248169
-0.1570287301	0.4582584416	4067/16384	0.24823
-0.15647697	0.4582856516	1017/4096	0.248291
-0.1562733891	0.4589668771	445/1792	0.248326
-0.1564821806	0.4590872607	4069/16384	0.248352
-0.1569351216	0.4590606473	2035/8192	0.248413
-0.1568725524	0.4592145919	159/640	0.248438
-0.1571353688	0.4595563429	4071/16384	0.248474
-0.1569683479	0.4596830555	493/1984	0.248488
-0.156777714	0.4598734408	167/672	0.248512
-0.1566432292	0.4598822276	505/2032	0.248524
-0.1565756192	0.4598300084	169/680	0.248529
-0.1565162758	0.4596525837	509/2048	0.248535
-0.1564905611	0.4602465871	4073/16384	0.248596
-0.1569009527	0.4604722262	2037/8192	0.248657
-0.1573002691	0.4601849993	4075/16384	0.248718
-0.1575865987	0.4603758675	509/2046	0.248778
-0.1575784337	0.4603866893	1019/4096	0.248779
-0.1573288654	0.460796223	4077/16384	0.24884
-0.1574354071	0.4614433511	2039/8192	0.248901
-0.1568282863	0.461169668	4079/16384	0.248962
-0.1570129753	0.460995781	509/2044	0.249022
-0.1570218664	0.4609917903	255/1024	0.249023
-0.1570218664	0.4609917903	255/1024	0.249023
-0.1573329488	0.460874897	4081/16384	0.249084
-0.1569782709	0.460491256	2041/8192	0.249146
-0.1566487228	0.46075663	4083/16384	0.249207
-0.1563120992	0.4606340244	1021/4096	0.249268
-0.1559532353	0.4608936989	4085/16384	0.249329
-0.1560728985	0.4610389016	383/1536	0.249349
-0.1560642502	0.4612050072	2043/8192	0.24939
-0.1555424142	0.4612624157	4087/16384	0.249451
-0.1556175047	0.460927094	479/1920	0.249479
-0.1557197917	0.4609523424	495/1984	0.249496
-0.1557380268	0.4610046023	503/2016	0.249504
-0.1557107199	0.4610246578	507/2032	0.249508
-0.1556974126	0.4610114007	509/2040	0.24951
-0.1557057651	0.4610072182	511/2048	0.249512
-0.1559354008	0.4609162344	4089/16384	0.249573
-0.1557835216	0.4606117211	2045/8192	0.249634
-0.1554762991	0.4605655085	4091/16384	0.249695
-0.1555276681	0.4603581645	1023/4096	0.249756
-0.1555288983	0.4603586235	511/2046	0.249756
-0.1557415945	0.4603429543	4093/16384	0.249817
-0.1558374243	0.4601829698	2047/8192	0.249878
-0.1558771351	0.4603629273	4095/16384	0.249939
-0.1558771351	0.4603629273	1/4	0.25
-0.1558771351	0.4603629273	1/4	0.25
-0.1557488856	0.4603480917	4097/16384	0.250061
-0.1557879508	0.4605886739	2049/8192	0.250122
-0.1560111032	0.4605239261	4099/16384	0.250183
-0.1562503041	0.4606486586	1025/4096	0.250244
-0.1565183961	0.4602697403	4101/16384	0.250305
-0.1562394585	0.4601797486	2051/8192	0.250366
-0.1561419535	0.4598757955	4103/16384	0.250427
-0.1566281088	0.4597855026	513/2048	0.250488
-0.1565756192	0.4598300084	511/2040	0.25049
-0.1566432292	0.4598822276	509/2032	0.250492
-0.156777714	0.4598734408	505/2016	0.250496
-0.1569683479	0.4596830555	497/1984	0.250504
-0.1568725524	0.4592145919	481/1920	0.250521
-0.1565551796	0.4590739091	4105/16384	0.250549
-0.1562733891	0.4589668771	449/1792	0.250558
-0.1559319839	0.4590912302	2053/8192	0.25061
-0.1558472648	0.4594819744	385/1536	0.250651
-0.1558813231	0.459558502	4107/16384	0.250671
-0.1556789774	0.4596152798	1027/4096	0.250732
-0.1556815311	0.4596131697	171/682	0.250733
-0.1554181355	0.4593509395	4109/16384	0.250793
-0.1550915232	0.4596872394	2055/8192	0.250854
-0.1546511448	0.459436381	4111/16384	0.250916
-0.1550563329	0.4586127385	257/1024	0.250977
-0.1550563329	0.4586127385	257/1024	0.250977
-0.1549941811	0.4585874216	513/2044	0.250978
-0.1544011583	0.4581218299	4113/16384	0.251038
-0.1537610971	0.4586144749	2057/8192	0.251099
-0.1540576982	0.4592940205	4115/16384	0.25116
-0.153586824	0.4598376747	1029/4096	0.251221
-0.1542036365	0.4602729793	4117/16384	0.251282
-0.1544327054	0.4600214049	2059/8192	0.251343
-0.1547079868	0.4603128732	4119/16384	0.251404
-0.1558771351	0.4603629273	515/2048	0.251465
-0.1544495828	0.4604212008	171/680	0.251471
-0.1544887892	0.4604083825	511/2032	0.251476
-0.1544832851	0.4603337229	169/672	0.251488
-0.1543469005	0.4602955171	499/1984	0.251512
-0.1541737564	0.4602141902	4121/16384	0.251526
-0.1541625482	0.4605768476	161/640	0.251563
-0.1538655915	0.4607792148	2061/8192	0.251587
-0.1544385795	0.4610728186	4123/16384	0.251648
-0.1542953227	0.461439581	1031/4096	0.251709
-0.154281069	0.4614428148	515/2046	0.251711
-0.1536990836	0.4614193225	4125/16384	0.25177
-0.1535884734	0.4620341543	2063/8192	0.251831
-0.1527626365	0.4619860159	4127/16384	0.251892
-0.1521018479	0.4612988324	129/512	0.251953
-0.1521018479	0.4612988324	129/512	0.251953
-0.1520232829	0.4613353978	515/2044	0.251957
-0.1513289967	0.4610068433	4129/16384	0.252014
-0.1510349998	0.4620516488	2065/8192	0.252075
-0.1518905754	0.4623594717	4131/16384	0.252136
-0.1516813734	0.4634321459	1033/4096	0.252197
-0.1528418002	0.4636493319	4133/16384	0.252258
-0.1529660916	0.4630256812	2067/8192	0.252319
-0.1536543923	0.4630806745	4135/16384	0.25238
-0.1539216356	0.4641513786	517/2048	0.252441
-0.1537597145	0.4643691601	103/408	0.252451
-0.1541106058	0.4644720217	513/2032	0.252461
-0.154465611	0.4642002397	509/2016	0.25248
-0.1547368005	0.4640604564	4137/16384	0.252502
-0.1545988266	0.4636578884	501/1984	0.25252
-0.1548061851	0.4632921839	2069/8192	0.252563
-0.1544626493	0.4630760042	97/384	0.252604
-0.1543477772	0.4630463099	4139/16384	0.252625
-0.154494419	0.4627884286	1035/4096	0.252686
-0.1545080317	0.4627796318	47/186	0.252688
-0.1549375602	0.4628492946	4141/16384	0.252747
-0.1551788274	0.4624673524	2071/8192	0.252808
-0.155449738	0.4629832455	4143/16384	0.252869
-0.1551794294	0.4629796934	259/1024	0.25293
-0.1551794294	0.4629796934	259/1024	0.25293
-0.1551762145	0.4629994212	517/2044	0.252935
-0.1548528697	0.4628328008	4145/16384	0.252991
-0.1546912653	0.46341268	2073/8192	0.253052
-0.1552441084	0.4634867685	4147/16384	0.253113
-0.1555719819	0.4642753343	1037/4096	0.253174
-0.1564785055	0.4640320621	4149/16384	0.253235
-0.1562716371	0.4637240696	389/1536	0.253255
-0.1563889235	0.463448906	2075/8192	0.253296
-0.1573543517	0.4634837715	4151/16384	0.253357
-0.1569835424	0.4639867053	519/2048	0.253418
-0.1570499148	0.4638913883	517/2040	0.253431
-0.1568503284	0.4638368147	515/2032	0.253445
-0.1566313128	0.4641053829	73/288	0.253472
-0.1563352601	0.4641187334	4153/16384	0.253479
-0.1568131614	0.464888837	503/1984	0.253528
-0.1564436437	0.4652209041	2077/8192	0.25354
-0.1575960105	0.4652213032	4155/16384	0.253601
-0.1576964543	0.4663239275	487/1920	0.253646
-0.1576797795	0.4660428872	1039/4096	0.253662
-0.157723407	0.4661336171	173/682	0.253666
-0.1564105158	0.4676182698	4157/16384	0.253723
-0.1575293515	0.468006856	2079/8192	0.253784
-0.156957464	0.4687631484	4159/16384	0.253845
-0.1565697323	0.46844213	65/256	0.253906
-0.1565697323	0.46844213	65/256	0.253906
-0.1565113567	0.4685624602	519/2044	0.253914
-0.1553457201	0.4673379295	4161/16384	0.253967
-0.1552172861	0.4694555943	2081/8192	0.254028
-0.1563275272	0.4694169932	4163/16384	0.254089
-0.1570703128	0.4707668486	1041/4096	0.25415
-0.1580944144	0.4701384516	4165/16384	0.254211
-0.1578187789	0.4695358927	2083/8192	0.254272
-0.1586605338	0.4691143092	4167/16384	0.254333
-0.1600216558	0.469987086	521/2048	0.254395
-0.1601503271	0.4705486235	173/680	0.254412
-0.1607780918	0.4701258707	517/2032	0.254429
-0.1609259785	0.4694876421	4169/16384	0.254456
-0.1609070697	0.4691525276	57/224	0.254464
-0.1604893203	0.4682821655	2085/8192	0.254517
-0.1601514552	0.4680707321	505/1984	0.254536
-0.1598311231	0.4683313088	391/1536	0.254557
-0.1596339493	0.4684156664	4171/16384	0.254578
-0.1595636759	0.4678768111	1043/4096	0.254639
-0.1595105954	0.467801587	521/2046	0.254643
-0.1599670501	0.4676918702	163/640	0.254688
-0.1603633288	0.4673262844	4173/16384	0.2547
-0.1600791698	0.4665005508	2087/8192	0.254761
-0.1611686361	0.4658704751	4175/16384	0.254822
-0.1620161363	0.4660462256	261/1024	0.254883
-0.1620161363	0.4660462256	261/1024	0.254883
-0.1618370402	0.4659648753	521/2044	0.254892
-0.1628632683	0.4657633666	4177/16384	0.254944
-0.1624054038	0.4647789565	2089/8192	0.255005
-0.1621043848	0.4644582115	457/1792	0.255022
-0.1617009873	0.4649921247	4179/16384	0.255066
-0.1610059961	0.4642290421	1045/4096	0.255127
-0.1603258762	0.4645019419	4181/16384	0.255188
-0.160381607	0.4649489932	2091/8192	0.255249
-0.1596391034	0.4649170129	4183/16384	0.25531
-0.1599216305	0.4645132045	523/2048	0.255371
-0.1599024695	0.4646536418	521/2040	0.255392
-0.1601507561	0.464592561	519/2032	0.255413
-0.1604290804	0.4643665246	4185/16384	0.255432
-0.1601952991	0.4641838192	515/2016	0.255456
-0.1602439161	0.4635837399	2093/8192	0.255493
-0.1596428697	0.4636392915	507/1984	0.255544
-0.1595027498	0.4634997882	4187/16384	0.255554
-0.1596675981	0.4628857131	1047/4096	0.255615
-0.1596355927	0.4628360324	523/2046	0.255621
-0.1604738689	0.4629604029	4189/16384	0.255676
-0.1610165251	0.4627351456	491/1920	0.255729
-0.160939956	0.4626414749	2095/8192	0.255737
-0.1610231689	0.4632564319	4191/16384	0.255798
-0.1607385595	0.4632173426	131/512	0.255859
-0.1607385595	0.4632173426	131/512	0.255859
-0.1607792144	0.4632433998	523/2044	0.255871
-0.1603069069	0.4630269996	4193/16384	0.25592
-0.1602816083	0.463846193	2097/8192	0.255981
-0.1608204063	0.4637818658	4195/16384	0.256042
-0.1614509839	0.4644337625	1049/4096	0.256104
-0.1621043848	0.4644582115	459/1792	0.256138
-0.162175334	0.4639317238	4197/16384	0.256165
-0.1618647148	0.4634809948	2099/8192	0.256226
-0.1624359724	0.4627279239	4199/16384	0.256287
-0.1638598277	0.46301202	525/2048	0.256348
-0.1642599006	0.4634447861	523/2040	0.256373
-0.164698589	0.4627261363	521/2032	0.256398
-0.1650036372	0.4623330967	4201/16384	0.256409
-0.1640459839	0.4616277051	517/2016	0.256448
-0.1639133573	0.4609283645	2101/8192	0.25647
-0.1630020095	0.4614024785	4203/16384	0.256531
-0.1625573078	0.4613854874	509/1984	0.256552
-0.1626006749	0.4607842659	1051/4096	0.256592
-0.1625077379	0.460843102	175/682	0.256598
-0.1633145354	0.4596876328	4205/16384	0.256653
-0.1630299947	0.4584534661	2103/8192	0.256714
-0.16484796	0.4590757402	493/1920	0.256771
-0.1648042754	0.4589106397	4207/16384	0.256775
-0.1642149851	0.4595289146	263/1024	0.256836
-0.1642149851	0.4595289146	263/1024	0.256836
-0.1643232188	0.4593597885	75/292	0.256849
-0.1633639481	0.4601132763	4209/16384	0.256897
-0.1644513422	0.4613314185	2105/8192	0.256958
-0.165507086	0.4605605749	4211/16384	0.257019
-0.1689468845	0.4595576742	1053/4096	0.25708
-0.1684179144	0.4577297256	4213/16384	0.257141
-0.1678469562	0.4579328719	395/1536	0.257161
-0.1673852105	0.4574631025	2107/8192	0.257202
-0.1683242805	0.4558121623	4215/16384	0.257263
-0.168826562	0.4567953253	527/2048	0.257324
-0.1682840748	0.4571230698	35/136	0.257353
-0.1690261497	0.4578547123	523/2032	0.257382
-0.1689755753	0.4579966315	4217/16384	0.257385
-0.1706899468	0.4574309798	173/672	0.25744
-0.1706727521	0.4575179406	2109/8192	0.257446
-0.1708355216	0.4565282276	4219/16384	0.257507
-0.1715471264	0.4569496878	511/1984	0.25756
-0.1715681132	0.4568225402	1055/4096	0.257568
-0.1716245152	0.4565721699	17/66	0.257576
-0.1717414973	0.4578425463	4221/16384	0.257629
-0.1723151321	0.4581575194	2111/8192	0.25769
-0.1716371524	0.4588622621	4223/16384	0.257751
-0.1714276619	0.4583581497	33/128	0.257812
-0.1714276619	0.4583581497	33/128	0.257812
-0.1715441501	0.4585767899	527/2044	0.257828
-0.1713793809	0.457598023	4225/16384	0.257874
-0.1699665159	0.4579667924	2113/8192	0.257935
-0.1702964435	0.4590092671	4227/16384	0.257996
-0.171566337	0.4625087086	1057/4096	0.258057
-0.173173904	0.4610973743	4229/16384	0.258118
-0.1727859151	0.4602214332	2115/8192	0.258179
-0.174103755	0.4591579089	4231/16384	0.25824
-0.175503121	0.4587668246	529/2048	0.258301
-0.176282774	0.4589017525	31/120	0.258333
-0.1760575815	0.4580893769	4233/16384	0.258362
-0.1761763361	0.4580017521	525/2032	0.258366
-0.176033206	0.4578824618	463/1792	0.258371
-0.175176791	0.4573198778	2117/8192	0.258423
-0.175176248	0.4571011765	521/2016	0.258433
-0.174729256	0.4575469818	397/1536	0.258464
-0.1746095849	0.4576970778	4235/16384	0.258484
-0.1742985934	0.457236683	1059/4096	0.258545
-0.1741376551	0.4574069624	529/2046	0.258553
-0.1745210498	0.4573515506	513/1984	0.258569
-0.1748129292	0.456174913	4237/16384	0.258606
-0.1739212587	0.4552857955	2119/8192	0.258667
-0.1740623496	0.4539248742	4239/16384	0.258728
-0.1746531578	0.4538872588	265/1024	0.258789
-0.1746531578	0.4538872588	265/1024	0.258789
-0.1743209792	0.4540463797	529/2044	0.258806
-0.1754196149	0.4535604894	4241/16384	0.25885
-0.1755909751	0.4535261719	497/1920	0.258854
-0.1747559966	0.4527568091	2121/8192	0.258911
-0.1742389323	0.4529672671	4243/16384	0.258972
-0.1730963909	0.4526755944	1061/4096	0.259033
-0.1725722875	0.4532473412	4245/16384	0.259094
-0.1728411649	0.4536275131	2123/8192	0.259155
-0.1720790751	0.4542114354	4247/16384	0.259216
-0.1720171172	0.4535055557	531/2048	0.259277
-0.1725193219	0.4534661924	529/2040	0.259314
-0.1724433259	0.4528712202	4249/16384	0.259338
-0.1723997498	0.4526660071	527/2032	0.25935
-0.1711539644	0.4517329801	2125/8192	0.259399
-0.1702082044	0.4518737429	523/2016	0.259425
-0.1701275818	0.4528363034	4251/16384	0.25946
-0.16917953	0.4522087421	1063/4096	0.259521
-0.1691815721	0.4525597968	177/682	0.259531
-0.1686650816	0.4509779568	515/1984	0.259577
-0.168632578	0.4508081147	4253/16384	0.259583
-0.1678389659	0.4507136014	2127/8192	0.259644
-0.1679651929	0.4497367223	4255/16384	0.259705
-0.1685311388	0.4499216216	133/512	0.259766
-0.1685311388	0.4499216216	133/512	0.259766
-0.1682375833	0.4500223752	531/2044	0.259785
-0.1694087222	0.4507317329	4257/16384	0.259827
-0.1692425952	0.4483706639	2129/8192	0.259888
-0.1695845941	0.4480358572	499/1920	0.259896
-0.1683462694	0.4485946461	4259/16384	0.259949
-0.1670077955	0.4482348358	1065/4096	0.26001
-0.1662681628	0.4488838611	4261/16384	0.260071
-0.1666295496	0.4494388186	2131/8192	0.260132
-0.1661891618	0.4505316144	4263/16384	0.260193
-0.1653607701	0.4506959461	533/2048	0.260254
-0.1648271597	0.4507826657	177/680	0.260294
-0.1647944021	0.451246028	4265/16384	0.260315
-0.1651029358	0.4513715458	529/2032	0.260335
-0.1655590502	0.4518260054	2133/8192	0.260376
-0.1659206164	0.4516655274	25/96	0.260417
-0.1660151147	0.4515489233	4267/16384	0.260437
-0.1662724348	0.4518959702	1067/4096	0.260498
-0.1662936668	0.4517675061	533/2046	0.260508
-0.1659765935	0.4525828205	4269/16384	0.260559
-0.1663987981	0.4526493976	517/1984	0.260585
-0.1661998593	0.4532840362	2135/8192	0.26062
-0.1650563867	0.4531002041	4271/16384	0.260681
-0.1653967886	0.4527029432	267/1024	0.260742
-0.1653967886	0.4527029432	267/1024	0.260742
-0.1654079055	0.4528840719	533/2044	0.260763
-0.165815289	0.4522888839	4273/16384	0.260803
-0.1650799219	0.4517801	2137/8192	0.260864
-0.1646089466	0.4521977165	4275/16384	0.260925
-0.1644046775	0.4521103669	167/640	0.260937
-0.1635075651	0.4522255801	1069/4096	0.260986
-0.1628251878	0.4529087964	4277/16384	0.261047
-0.1631650044	0.4531258125	401/1536	0.261068
-0.1632237697	0.4535862456	2139/8192	0.261108
-0.1616113409	0.4543304364	4279/16384	0.261169
-0.1619392904	0.4531840691	535/2048	0.26123
-0.1623756433	0.4530942412	533/2040	0.261275
-0.1626382621	0.4525547289	4281/16384	0.261292
-0.1621157591	0.4523964488	531/2032	0.261319
-0.1619160434	0.4514787362	2141/8192	0.261353
-0.1604948501	0.4513567305	527/2016	0.261409
-0.1608460095	0.4512450454	4283/16384	0.261414
-0.1613010361	0.4503804595	1071/4096	0.261475
-0.1611218843	0.4504797975	535/2046	0.261486
-0.1622766456	0.4504135327	4285/16384	0.261536
-0.1627724603	0.450121141	519/1984	0.261593
-0.1627790806	0.4500514235	2143/8192	0.261597
-0.1630958617	0.4507195296	4287/16384	0.261658
-0.1627128746	0.4507891316	67/256	0.261719
-0.1627128746	0.4507891316	67/256	0.261719
-0.162771252	0.4506547221	535/2044	0.261742
-0.1621512925	0.4507479107	4289/16384	0.26178
-0.1624605156	0.4517552339	2145/8192	0.261841
-0.1631132388	0.4515288929	4291/16384	0.261902
-0.1641167106	0.4516094214	1073/4096	0.261963
-0.1644046775	0.4521103669	503/1920	0.261979
-0.1645777554	0.4509585796	4293/16384	0.262024
-0.1641699992	0.4505678816	2147/8192	0.262085
-0.1642982422	0.449436441	4295/16384	0.262146
-0.1652437584	0.4490939893	537/2048	0.262207
-0.1659907089	0.4489932322	107/408	0.262255
-0.1660377404	0.448413504	4297/16384	0.262268
-0.1656153752	0.4479753337	533/2032	0.262303
-0.1648392422	0.4473825567	2149/8192	0.262329
-0.1641962392	0.4477757435	403/1536	0.26237
-0.1640914471	0.4480276267	4299/16384	0.26239
-0.1639049874	0.4479047483	529/2016	0.262401
-0.1633598447	0.4476521962	1075/4096	0.262451
-0.1635479663	0.4478533503	179/682	0.262463
-0.162193534	0.4458431297	4301/16384	0.262512
-0.1604965454	0.446729819	2151/8192	0.262573
-0.1598805752	0.445815379	521/1984	0.262601
-0.1590673595	0.4455780947	4303/16384	0.262634
-0.1596495949	0.4446353151	269/1024	0.262695
-0.1596495949	0.4446353151	269/1024	0.262695
-0.1601239191	0.4451759647	537/2044	0.26272
-0.1598692241	0.4419780166	4305/16384	0.262756
-0.1576052105	0.4435503344	2153/8192	0.262817
-0.1567330744	0.4436516769	471/1792	0.262835
-0.1576237553	0.4447360378	4307/16384	0.262878
-0.1569241868	0.4458346934	1077/4096	0.262939
-0.1570430885	0.4468229039	4309/16384	0.263
-0.1573945764	0.4467139032	101/384	0.263021
-0.1577574023	0.4469290136	2155/8192	0.263062
-0.157864404	0.4483454135	4311/16384	0.263123
-0.1569168184	0.4478300151	539/2048	0.263184
-0.1566656336	0.4472850111	179/680	0.263235
-0.1565528624	0.4469848145	4313/16384	0.263245
-0.1556885908	0.4477978155	535/2032	0.263287
-0.15514751	0.4473969978	2157/8192	0.263306
-0.1544943546	0.448644659	4315/16384	0.263367
-0.153346672	0.4478014136	1079/4096	0.263428
-0.1536417782	0.4479677719	49/186	0.263441
-0.1537049905	0.4464356016	4317/16384	0.263489
-0.153548323	0.4454646508	2159/8192	0.26355
-0.1545756046	0.4454491689	523/1984	0.263609
-0.1545782841	0.4454010802	4319/16384	0.263611
-0.1545077519	0.4459356446	135/512	0.263672
-0.1545077519	0.4459356446	135/512	0.263672
-0.1542466429	0.4459498837	77/292	0.263699
-0.1542774649	0.4466048145	4321/16384	0.263733
-0.1555336157	0.4465816045	2161/8192	0.263794
-0.1556249339	0.4457062176	4323/16384	0.263855
-0.1561202149	0.4446720421	1081/4096	0.263916
-0.1567330744	0.4436516769	473/1792	0.263951
-0.1556739866	0.4436559005	4325/16384	0.263977
-0.1548625154	0.4439562382	2163/8192	0.264038
-0.1546594578	0.4434624413	169/640	0.264062
-0.1537098423	0.4434581779	4327/16384	0.264099
-0.1538889663	0.4426591297	541/2048	0.26416
-0.1536731421	0.4418460224	539/2040	0.264216
-0.1537020591	0.4417601988	4329/16384	0.264221
-0.1527849655	0.4423587661	537/2032	0.264272
-0.1527382581	0.4422158366	2165/8192	0.264282
-0.1526407341	0.4428590978	4331/16384	0.264343
-0.1516014637	0.4433196425	533/2016	0.264385
-0.1519964811	0.4429137282	1083/4096	0.264404
-0.1522295479	0.4428171193	541/2046	0.264418
-0.1514350856	0.4421178837	4333/16384	0.264465
-0.1505988799	0.4414939609	2167/8192	0.264526
-0.1516685411	0.44067964	4335/16384	0.264587
-0.1520508317	0.441106226	525/1984	0.264617
-0.1518282069	0.4412618417	271/1024	0.264648
-0.1518282069	0.4412618417	271/1024	0.264648
-0.1515485741	0.4415038589	541/2044	0.264677
-0.151983457	0.4418720567	4337/16384	0.264709
-0.1528465949	0.4414354985	2169/8192	0.264771
-0.152765393	0.44072083	4339/16384	0.264832
-0.1530373648	0.4399273324	1085/4096	0.264893
-0.1529367514	0.4392389939	4341/16384	0.264954
-0.1526751326	0.439287377	407/1536	0.264974
-0.1523632236	0.4390553072	2171/8192	0.265015
-0.1527149157	0.4378165281	4343/16384	0.265076
-0.153534833	0.4382884484	509/1920	0.265104
-0.1532223263	0.4384704457	543/2048	0.265137
-0.1534568021	0.4391064907	541/2040	0.265196
-0.1534204379	0.4390874383	4345/16384	0.265198
-0.1543454125	0.4388353512	539/2032	0.265256
-0.1543082913	0.4388168413	2173/8192	0.265259
-0.154672351	0.4382252393	4347/16384	0.26532
-0.1551385498	0.4386489704	535/2016	0.265377
-0.1552070273	0.4386356671	1087/4096	0.265381
-0.15495937	0.4384896364	181/682	0.265396
-0.1551710845	0.4393545855	4349/16384	0.265442
-0.1553833879	0.4398426762	2175/8192	0.265503
-0.1547716127	0.4400752616	4351/16384	0.265564
-0.1547335773	0.4397241662	17/64	0.265625
-0.1547335773	0.4397241662	17/64	0.265625
-0.1549736937	0.4396728533	543/2044	0.265656
-0.1547518967	0.4392855291	4353/16384	0.265686
-0.1540214821	0.439473505	2177/8192	0.265747
-0.1540384252	0.4400349576	4355/16384	0.265808
-0.1538727424	0.4407364363	1089/4096	0.265869
-0.1542114346	0.4414034165	4357/16384	0.26593
-0.1548035139	0.4411275352	2179/8192	0.265991
-0.155862338	0.4412694551	4359/16384	0.266052
-0.1559328127	0.4421195374	545/2048	0.266113
-0.1546594578	0.4434624413	511/1920	0.266146
-0.1563267935	0.4432349662	4361/16384	0.266174
-0.1562126583	0.4430770818	181/680	0.266176
-0.1567330744	0.4436516769	477/1792	0.266183
-0.1577343583	0.4421721002	2181/8192	0.266235
-0.1574623615	0.4423625381	541/2032	0.26624
-0.1574948774	0.4413894498	409/1536	0.266276
-0.1572407197	0.4412229744	4363/16384	0.266296
-0.1577093038	0.4404454776	1091/4096	0.266357
-0.157527963	0.4406269698	179/672	0.266369
-0.1575587286	0.440823945	545/2046	0.266373
-0.1591099877	0.4387977654	4365/16384	0.266418
-0.1580506585	0.437603806	2183/8192	0.266479
-0.1586979064	0.4361819227	4367/16384	0.266541
-0.159596737	0.4365368055	273/1024	0.266602
-0.159596737	0.4365368055	273/1024	0.266602
-0.159306943	0.4372836412	529/1984	0.266633
-0.1590625782	0.4372989645	545/2044	0.266634
-0.1616662523	0.4366766666	4369/16384	0.266663
-0.1603804132	0.4346684567	2185/8192	0.266724
-0.1592721204	0.4346359371	4371/16384	0.266785
-0.157995357	0.434255995	1093/4096	0.266846
-0.1570611321	0.4346617889	4373/16384	0.266907
-0.1571539791	0.435335649	2187/8192	0.266968
-0.1560772523	0.4359740872	4375/16384	0.267029
-0.1559541103	0.4350228493	547/2048	0.26709
-0.1563848617	0.4338898751	4377/16384	0.267151
-0.1568249043	0.433810847	109/408	0.267157
-0.1548298163	0.4338894285	171/640	0.267188
-0.1542635307	0.4340279476	2189/8192	0.267212
-0.153896722	0.4338012918	543/2032	0.267224
-0.1537764909	0.434966698	4379/16384	0.267273
-0.1529418374	0.4345185902	1095/4096	0.267334
-0.1534105571	0.4346299716	547/2046	0.267351
-0.1532307799	0.4341182698	77/288	0.267361
-0.1525877207	0.433550629	4381/16384	0.267395
-0.1519701987	0.4330763221	2191/8192	0.267456
-0.1524854659	0.4321576342	4383/16384	0.267517
-0.1529537549	0.4326130265	137/512	0.267578
-0.1529537549	0.4326130265	137/512	0.267578
-0.152582871	0.4330846145	547/2044	0.267613
-0.1533736749	0.4333112756	4385/16384	0.267639
-0.1533176709	0.4332415758	531/1984	0.267641
-0.1545708732	0.4320592644	2193/8192	0.2677
-0.15355452	0.4311131691	4387/16384	0.267761
-0.1526878475	0.4301584486	1097/4096	0.267822
-0.1514174981	0.4296925017	4389/16384	0.267883
-0.1509803698	0.4309857177	2195/8192	0.267944
-0.1500536326	0.4323244826	4391/16384	0.268005
-0.1490062209	0.4319820699	549/2048	0.268066
-0.14702783	0.4324235754	4393/16384	0.268127
-0.1469381609	0.4335584764	547/2040	0.268137
-0.1487128026	0.433833147	2197/8192	0.268188
-0.1490258674	0.4341491505	545/2032	0.268209
-0.1492765318	0.4337869461	103/384	0.268229
-0.1494868022	0.4336572368	4395/16384	0.26825
-0.1497980994	0.4342569919	1099/4096	0.268311
-0.1494890315	0.4340321598	183/682	0.268328
-0.1494701545	0.4346865126	541/2016	0.268353
-0.1496478581	0.435175868	4397/16384	0.268372
-0.150024723	0.4360682464	2199/8192	0.268433
-0.1486537267	0.4365501891	4399/16384	0.268494
-0.148689031	0.4357804301	275/1024	0.268555
-0.148689031	0.4357804301	275/1024	0.268555
-0.1492729825	0.4355689711	549/2044	0.268591
-0.1488391338	0.434988879	4401/16384	0.268616
-0.1482155443	0.4349237037	533/1984	0.268649
-0.1473719112	0.4349510546	2201/8192	0.268677
-0.1471414155	0.4362008848	4403/16384	0.268738
-0.1466812745	0.4373109703	1101/4096	0.268799
-0.1468051568	0.4382690413	4405/16384	0.26886
-0.1471584963	0.4382157011	413/1536	0.26888
-0.1475842683	0.438517295	2203/8192	0.268921
-0.1473008202	0.4400418348	4407/16384	0.268982
-0.146583347	0.4393884407	551/2048	0.269043
-0.1461696535	0.4387190608	4409/16384	0.269104
-0.1458178008	0.4387642709	183/680	0.269118
-0.145262454	0.4393822496	2205/8192	0.269165
-0.1449966981	0.4397618944	547/2032	0.269193
-0.145121306	0.4401744045	4411/16384	0.269226
-0.1441473041	0.440068863	517/1920	0.269271
-0.1443881811	0.4400842658	1103/4096	0.269287
-0.1446570435	0.43992383	551/2046	0.269306
-0.1438736473	0.4394890269	181/672	0.269345
-0.1439282798	0.439482902	4413/16384	0.269348
-0.1432472295	0.4392208954	2207/8192	0.269409
-0.1435362828	0.4383073016	4415/16384	0.26947
-0.1439779764	0.438628886	69/256	0.269531
-0.1439779764	0.438628886	69/256	0.269531
-0.1439638646	0.4390326462	551/2044	0.269569
-0.1443333388	0.4390371498	4417/16384	0.269592
-0.1449873615	0.4383274642	2209/8192	0.269653
-0.1448852852	0.4383607296	535/1984	0.269657
-0.1445072655	0.4375112454	4419/16384	0.269714
-0.1441251911	0.4361315587	1105/4096	0.269775
-0.1417979512	0.4349030041	4421/16384	0.269836
-0.1416348988	0.4373221642	2211/8192	0.269897
-0.1410679388	0.4392288875	4423/16384	0.269958
-0.1396939512	0.4393928193	553/2048	0.27002
-0.1376881533	0.4409222549	4425/16384	0.270081
-0.1393244613	0.4418402622	551/2040	0.270098
-0.140390373	0.4417164453	2213/8192	0.270142
-0.141291909	0.4413456279	549/2032	0.270177
-0.1410965797	0.4412668009	415/1536	0.270182
-0.1412258553	0.4409476273	4427/16384	0.270203
-0.1419782319	0.4412780303	1107/4096	0.270264
-0.1416508339	0.4414631382	553/2046	0.270283
-0.142267105	0.4418663572	173/640	0.270313
-0.1425232779	0.4420077178	4429/16384	0.270325
-0.1428145026	0.4420278814	545/2016	0.270337
-0.1433258368	0.4421171005	2215/8192	0.270386
-0.143464099	0.4429383324	4431/16384	0.270447
-0.142946998	0.4430096855	277/1024	0.270508
-0.142946998	0.4430096855	277/1024	0.270508
-0.1426450639	0.442662097	79/292	0.270548
-0.1421985497	0.4427869727	4433/16384	0.270569
-0.143080227	0.4444174102	2217/8192	0.27063
-0.1438432691	0.4449549616	485/1792	0.270647
-0.1438421418	0.4440910371	537/1984	0.270665
-0.143711382	0.4438075041	4435/16384	0.270691
-0.1443524263	0.4436310793	1109/4096	0.270752
-0.1446841373	0.4432138345	4437/16384	0.270813
-0.1444471292	0.4428730788	2219/8192	0.270874
-0.1448492758	0.4422775815	4439/16384	0.270935
-0.1451001537	0.4427479504	555/2048	0.270996
-0.1450726921	0.443188259	4441/16384	0.271057
-0.145306721	0.4432139052	553/2040	0.271078
-0.1458086122	0.4432763426	2221/8192	0.271118
-0.1461465542	0.4430522317	551/2032	0.271161
-0.1463505121	0.4427971753	4443/16384	0.271179
-0.1468893392	0.4433938863	1111/4096	0.27124
-0.1466094331	0.4432994323	185/682	0.271261
-0.14653013	0.4441589513	4445/16384	0.271301
-0.1470630017	0.4446827971	547/2016	0.271329
-0.146261087	0.4448799375	521/1920	0.271354
-0.1463962944	0.4448389294	2223/8192	0.271362
-0.1457417117	0.4446429132	4447/16384	0.271423
-0.1458891207	0.444339755	139/512	0.271484
-0.1458891207	0.444339755	139/512	0.271484
-0.1460987213	0.4442862079	555/2044	0.271526
-0.1461010507	0.4440098518	4449/16384	0.271545
-0.1454728175	0.4438352677	2225/8192	0.271606
-0.1452243616	0.4442648349	4451/16384	0.271667
-0.145175312	0.444212366	539/1984	0.271673
-0.1447601134	0.4446060155	1113/4096	0.271729
-0.1438432691	0.4449549616	487/1792	0.271763
-0.1445830195	0.4452742108	4453/16384	0.27179
-0.145185306	0.4454111707	2227/8192	0.271851
-0.145662756	0.4461089061	4455/16384	0.271912
-0.1451449813	0.4464697237	557/2048	0.271973
-0.1445856955	0.4471933659	4457/16384	0.272034
-0.1450841369	0.4471911803	37/136	0.272059
-0.1456065522	0.4475233636	2229/8192	0.272095
-0.1459693243	0.4471017535	553/2032	0.272146
-0.1461261185	0.4470626895	4459/16384	0.272156
-0.1467363102	0.447345775	1115/4096	0.272217
-0.1465127662	0.4474135295	557/2046	0.272239
-0.1468181997	0.4483718687	4461/16384	0.272278
-0.147434686	0.4496704068	2231/8192	0.272339
-0.1455186416	0.4496088833	523/1920	0.272396
-0.1455951804	0.4497296827	4463/16384	0.2724
-0.1459037582	0.4490638647	279/1024	0.272461
-0.1459037582	0.4490638647	279/1024	0.272461
-0.1461698546	0.4488935981	557/2044	0.272505
-0.1461979017	0.448455047	4465/16384	0.272522
-0.1452395498	0.4482174478	2233/8192	0.272583
-0.1447660867	0.4488172532	4467/16384	0.272644
-0.1441017184	0.4492341909	541/1984	0.272681
-0.1439721031	0.4489783949	1117/4096	0.272705
-0.1432701781	0.4493605653	4469/16384	0.272766
-0.1434260382	0.4496824582	419/1536	0.272786
-0.1433329386	0.45019445	2235/8192	0.272827
-0.1417925319	0.4501380203	4471/16384	0.272888
-0.1423358187	0.4494899156	559/2048	0.272949
-0.1428106683	0.4491766616	4473/16384	0.27301
-0.1424565475	0.4489228949	557/2040	0.273039
-0.1423767105	0.4485496761	2237/8192	0.273071
-0.1417761178	0.4483169042	555/2032	0.27313
-0.1418088563	0.4483662262	4475/16384	0.273132
-0.1419719104	0.4478771886	1119/4096	0.273193
-0.1420594274	0.4480061572	559/2046	0.273216
-0.1423925092	0.4477440737	4477/16384	0.273254
-0.142628335	0.4474552541	551/2016	0.273313
-0.1426400804	0.4474389373	2239/8192	0.273315
-0.142974407	0.4476912553	4479/16384	0.273376
-0.1428012666	0.4478370784	35/128	0.273438
-0.1428012666	0.4478370784	35/128	0.273438
-0.1426692415	0.4478414198	559/2044	0.273483
-0.1425801576	0.447933016	4481/16384	0.273499
-0.1428479104	0.4483079958	2241/8192	0.27356
-0.1432166329	0.4481073731	4483/16384	0.273621
-0.1437072118	0.4479894398	1121/4096	0.273682
-0.1436101197	0.4479697312	543/1984	0.27369
-0.1440094429	0.4474206813	4485/16384	0.273743
-0.1435036768	0.4472323231	2243/8192	0.273804
-0.1431543418	0.4466972706	4487/16384	0.273865
-0.1435295364	0.4463619773	561/2048	0.273926
-0.1439507561	0.4455902288	4489/16384	0.273987
-0.1438432691	0.4449549616	491/1792	0.273996
-0.1434159442	0.4456105697	559/2040	0.27402
-0.1428436655	0.445573532	2245/8192	0.274048
-0.1425965756	0.4459613407	421/1536	0.274089
-0.1426339678	0.4461388497	4491/16384	0.274109
-0.1425985606	0.4460853263	557/2032	0.274114
-0.1421877213	0.4462419908	1123/4096	0.27417
-0.1422458017	0.4460646961	17/62	0.274194
-0.1416040272	0.4460577288	4493/16384	0.274231
-0.1410409063	0.4464535698	2247/8192	0.274292
-0.141095085	0.4462793734	79/288	0.274306
-0.1403737451	0.4459654075	4495/16384	0.274353
-0.1407646288	0.4455698984	281/1024	0.274414
-0.1407646288	0.4455698984	281/1024	0.274414
-0.1411792291	0.4456274655	561/2044	0.274462
-0.1414591812	0.4454371284	4497/16384	0.274475
-0.141363671	0.4455418868	527/1920	0.274479
-0.1399034279	0.4440310005	2249/8192	0.274536
-0.1394240734	0.4452931244	4499/16384	0.274597
-0.1388612027	0.4461505079	1125/4096	0.274658
-0.1386832642	0.4469977994	545/1984	0.274698
-0.1390719569	0.4469975348	4501/16384	0.274719
-0.1396966811	0.4469356884	2251/8192	0.27478
-0.1401428313	0.4476524641	4503/16384	0.274841
-0.1395524261	0.4477733497	563/2048	0.274902
-0.1390442913	0.4476084144	4505/16384	0.274963
-0.1389815185	0.4481902484	11/40	0.275
-0.1388335311	0.4485173627	2253/8192	0.275024
-0.1393741394	0.4491284042	4507/16384	0.275085
-0.1393927034	0.4494021592	559/2032	0.275098
-0.1388877761	0.4497192461	1127/4096	0.275146
-0.1387877446	0.4494771386	563/2046	0.275171
-0.1381911226	0.4496778704	4509/16384	0.275208
-0.1375994095	0.4500580317	2255/8192	0.275269
-0.1374096109	0.4496893834	185/672	0.275298
-0.137088691	0.4494574907	4511/16384	0.27533
-0.1375066117	0.4492601849	141/512	0.275391
-0.1375066117	0.4492601849	141/512	0.275391
-0.1378001388	0.4492870581	563/2044	0.27544
-0.1379365953	0.4492427022	4513/16384	0.275452
-0.1378524557	0.4484036199	2257/8192	0.275513
-0.1379040832	0.4485654471	529/1920	0.275521
-0.1368253838	0.4482629156	4515/16384	0.275574
-0.1349916314	0.4489961859	1129/4096	0.275635
-0.1350912075	0.4503719299	4517/16384	0.275696
-0.1355059397	0.4506379972	547/1984	0.275706
-0.136088389	0.4503814461	2259/8192	0.275757
-0.1366843527	0.4511258056	4519/16384	0.275818
-0.1362226955	0.4515498012	565/2048	0.275879
-0.1356631665	0.4527181243	4521/16384	0.27594
-0.1367213091	0.4522666442	563/2040	0.27598
-0.136943816	0.452455143	2261/8192	0.276001
-0.1372638627	0.4518819711	4523/16384	0.276062
-0.137488333	0.4516711697	561/2032	0.276083
-0.1377996559	0.4518893125	1131/4096	0.276123
-0.1377422607	0.4520894761	565/2046	0.276149
-0.1382285365	0.4523914715	4525/16384	0.276184
-0.1392472843	0.4526253771	2263/8192	0.276245
-0.1392553991	0.4539010584	557/2016	0.27629
-0.1385371246	0.4539124621	4527/16384	0.276306
-0.1382115362	0.4533587882	283/1024	0.276367
-0.1382115362	0.4533587882	283/1024	0.276367
-0.1380913241	0.4530669146	565/2044	0.276419
-0.1380351988	0.4528949442	4529/16384	0.276428
-0.1373186388	0.4532513657	2265/8192	0.276489
-0.1373629455	0.4540071748	4531/16384	0.27655
-0.1372561312	0.4541990175	177/640	0.276562
-0.1368901695	0.4547156939	1133/4096	0.276611
-0.1365123997	0.4557338227	4533/16384	0.276672
-0.1370440142	0.4559227192	425/1536	0.276693
-0.1376458033	0.4557722315	549/1984	0.276714
-0.1376419501	0.4564407689	2267/8192	0.276733
-0.1363119447	0.4588199039	4535/16384	0.276794
-0.135758417	0.4572325815	567/2048	0.276855
-0.1359072613	0.4563426486	4537/16384	0.276917
-0.1346066282	0.4564482657	113/408	0.276961
-0.1347392312	0.456013246	2269/8192	0.276978
-0.1336267921	0.4562025716	4539/16384	0.277039
-0.1330401103	0.4551117795	563/2032	0.277067
-0.1335416675	0.4552715748	1135/4096	0.2771
-0.1338215239	0.4552983005	189/682	0.277126
-0.1340195838	0.4548897895	4541/16384	0.277161
-0.1341704543	0.4543482421	2271/8192	0.277222
-0.1346630926	0.4544403827	559/2016	0.277282
-0.1346738681	0.4544381224	4543/16384	0.277283
-0.1345839	0.4546919011	71/256	0.277344
-0.1345839	0.4546919011	71/256	0.277344
-0.1344957609	0.454864376	81/292	0.277397
-0.1344146878	0.4548938387	4545/16384	0.277405
-0.1348951782	0.4551418909	2273/8192	0.277466
-0.1351633133	0.4547037106	4547/16384	0.277527
-0.1355521211	0.4543227804	1137/4096	0.277588
-0.1354835295	0.4544814404	533/1920	0.277604
-0.1355829897	0.4535893605	4549/16384	0.277649
-0.1349395519	0.4536838272	2275/8192	0.27771
-0.1350220912	0.4536281176	551/1984	0.277722
-0.1343511625	0.4533246223	4551/16384	0.277771
-0.1345961157	0.4528633026	569/2048	0.277832
-0.1349497497	0.4516086379	4553/16384	0.277893
-0.1338027337	0.452383996	189/680	0.277941
-0.1336193776	0.4522848202	2277/8192	0.277954
-0.1334773577	0.4527843947	427/1536	0.277995
-0.1336014522	0.4529621938	4555/16384	0.278015
-0.13337916	0.4534083985	565/2032	0.278051
-0.1331836003	0.4532464289	1139/4096	0.278076
-0.1330679727	0.4530489409	569/2046	0.278104
-0.1326287504	0.4531954281	4557/16384	0.278137
-0.132048467	0.4536351894	2279/8192	0.278198
-0.131485984	0.4531098332	4559/16384	0.278259
-0.1316075077	0.4529239164	187/672	0.278274
-0.1318348836	0.4528409467	285/1024	0.27832
-0.1318348836	0.4528409467	285/1024	0.27832
-0.1321919935	0.4527254011	569/2044	0.278376
-0.1322610723	0.4527691958	4561/16384	0.278381
-0.1312362074	0.4512814336	2281/8192	0.278442
-0.1299186631	0.4515252352	499/1792	0.27846
-0.1309039329	0.4524410251	4563/16384	0.278503
-0.1303563889	0.452832335	1141/4096	0.278564
-0.1300491311	0.4534135736	4565/16384	0.278625
-0.1303244435	0.4535271938	107/384	0.278646
-0.1306002109	0.4537610025	2283/8192	0.278687
-0.1307133548	0.4542307563	553/1984	0.27873
-0.1306339725	0.4547917388	4567/16384	0.278748
-0.1299038542	0.4544410903	571/2048	0.278809
-0.1297042182	0.4539626288	4569/16384	0.27887
-0.1287091476	0.4543260063	569/2040	0.278922
-0.1288304566	0.4541414902	2285/8192	0.278931
-0.1280674534	0.4549559039	4571/16384	0.278992
-0.1269303232	0.4536704011	567/2032	0.279035
-0.1271697651	0.4541013777	1143/4096	0.279053
-0.127613015	0.4538570484	571/2046	0.279081
-0.1275169122	0.453283339	4573/16384	0.279114
-0.1276326735	0.4524788758	2287/8192	0.279175
-0.1282505086	0.452558181	4575/16384	0.279236
-0.1283326688	0.4528187033	563/2016	0.279266
-0.128193935	0.4528492951	143/512	0.279297
-0.128193935	0.4528492951	143/512	0.279297
-0.1281337983	0.4531285584	571/2044	0.279354
-0.1280831743	0.4531045806	4577/16384	0.279358
-0.1286076592	0.453192819	2289/8192	0.279419
-0.1287634273	0.4527560391	4579/16384	0.27948
-0.1290629999	0.452394504	1145/4096	0.279541
-0.1299186631	0.4515252352	501/1792	0.279576
-0.1291339378	0.4518041158	4581/16384	0.279602
-0.1285486658	0.4517965258	2291/8192	0.279663
-0.1285012551	0.4516006846	179/640	0.279687
-0.128091211	0.4513247768	4583/16384	0.279724
-0.1281764915	0.4511524748	555/1984	0.279738
-0.1284326177	0.4510393231	573/2048	0.279785
-0.1292271408	0.4504475205	4585/16384	0.279846
-0.1280770432	0.4503029566	571/2040	0.279902
-0.1281289928	0.4503095997	2293/8192	0.279907
-0.1277059084	0.4506201987	4587/16384	0.279968
-0.1271167959	0.450279617	569/2032	0.28002
-0.1271966691	0.4503922026	1147/4096	0.280029
-0.1274042396	0.4501447849	191/682	0.280059
-0.1271081158	0.4497513398	4589/16384	0.28009
-0.12680708	0.4488333853	2295/8192	0.280151
-0.1277937124	0.4487678247	4591/16384	0.280212
-0.127752006	0.4492144442	565/2016	0.280258
-0.127704412	0.4491469166	287/1024	0.280273
-0.127704412	0.4491469166	287/1024	0.280273
-0.1276268173	0.4494728241	573/2044	0.280333
-0.1276212335	0.44944346	4593/16384	0.280334
-0.128126616	0.4495032499	2297/8192	0.280396
-0.1283319335	0.4491248619	4595/16384	0.280457
-0.1287011209	0.4489280248	1149/4096	0.280518
-0.1290181542	0.4486521379	4597/16384	0.280579
-0.1289028557	0.4484942401	431/1536	0.280599
-0.1288408302	0.4481896831	2299/8192	0.28064
-0.1296004041	0.4477900914	4599/16384	0.280701
-0.1297309208	0.4483141482	539/1920	0.280729
-0.1295803622	0.4483606981	557/1984	0.280746
-0.1295462894	0.4482843852	575/2048	0.280762
-0.1294245373	0.4485490609	4601/16384	0.280823
-0.1297812782	0.4487521833	191/680	0.280882
-0.1297889389	0.4487476009	2301/8192	0.280884
-0.1301559197	0.4487136472	4603/16384	0.280945
-0.1302078455	0.4490381905	571/2032	0.281004
-0.1302067994	0.4490491806	1151/4096	0.281006
-0.1300694431	0.4490278459	575/2046	0.281036
-0.1300307219	0.449226552	4605/16384	0.281067
-0.1299607163	0.4494642206	2303/8192	0.281128
-0.1297302906	0.4494216183	4607/16384	0.281189
-0.1297709597	0.4493073471	9/32	0.28125
-0.1297709597	0.4493073471	9/32	0.28125
-0.1298331244	0.4492147708	4609/16384	0.281311
-0.1298334892	0.4492152222	575/2044	0.281311
-0.1296346416	0.4491274019	2305/8192	0.281372
-0.129520074	0.4492982139	4611/16384	0.281433
-0.12934255	0.4494452695	1153/4096	0.281494
-0.1292632114	0.4497511514	4613/16384	0.281555
-0.1295820881	0.4497718262	2307/8192	0.281616
-0.1298652638	0.4499726466	4615/16384	0.281677
-0.1297235635	0.4502025598	577/2048	0.281738
-0.1297355692	0.450137802	559/1984	0.281754
-0.1296273197	0.4501088341	541/1920	0.281771
-0.1290992256	0.4508316456	4617/16384	0.281799
-0.1299186631	0.4515252352	505/1792	0.281808
-0.1302269803	0.4505847745	2309/8192	0.28186
-0.1302125745	0.4505541102	115/408	0.281863
-0.1303384501	0.4502935733	433/1536	0.281901
-0.1302685033	0.4501824248	4619/16384	0.281921
-0.1305112815	0.4500075948	1155/4096	0.281982
-0.1304926281	0.4499937052	573/2032	0.281988
-0.1305939207	0.4501424811	577/2046	0.282014
-0.1308477809	0.4499828056	4621/16384	0.282043
-0.131123928	0.449628528	2311/8192	0.282104
-0.131625181	0.4498047572	4623/16384	0.282166
-0.1314494919	0.4500998035	289/1024	0.282227
-0.1314494919	0.4500998035	289/1024	0.282227
-0.131465633	0.4500214648	569/2016	0.282242
-0.1311582355	0.4502451017	4625/16384	0.282288
-0.1311823103	0.4502445581	577/2044	0.28229
-0.132297208	0.4514624724	2313/8192	0.282349
-0.1323655165	0.4501261365	4627/16384	0.28241
-0.1326384642	0.4494326604	1157/4096	0.282471
-0.1323565183	0.4488269245	4629/16384	0.282532
-0.1318775188	0.449008591	2315/8192	0.282593
-0.1313770383	0.4486349803	4631/16384	0.282654
-0.1317374227	0.4483668901	579/2048	0.282715
-0.131960028	0.4484205703	561/1984	0.282762
-0.1321182756	0.4483182034	4633/16384	0.282776
-0.1319768545	0.4478984858	181/640	0.282813
-0.1319699119	0.4476192317	2317/8192	0.282837
-0.1320136122	0.4476925328	577/2040	0.282843
-0.1313588162	0.4473834443	4635/16384	0.282898
-0.13142367	0.4467311601	1159/4096	0.282959
-0.1314525536	0.4468562628	575/2032	0.282972
-0.1316964776	0.4468726302	193/682	0.282991
-0.131932599	0.4463789875	4637/16384	0.28302
-0.1322273506	0.4457123673	2319/8192	0.283081
-0.1330690438	0.445966359	4639/16384	0.283142
-0.1327833729	0.4463772042	145/512	0.283203
-0.1327833729	0.4463772042	145/512	0.283203
-0.1325956072	0.4462785742	571/2016	0.283234
-0.1324565392	0.4466195656	4641/16384	0.283264
-0.1324484075	0.4465548562	579/2044	0.283268
-0.132885753	0.4472294101	2321/8192	0.283325
-0.133822796	0.4470108528	4643/16384	0.283386
-0.1357409636	0.4457753998	1161/4096	0.283447
-0.1352729701	0.4437035237	4645/16384	0.283508
-0.133647425	0.4442224624	2323/8192	0.283569
-0.1321861664	0.4438898365	4647/16384	0.28363
-0.1321110855	0.4428669697	581/2048	0.283691
-0.1312513627	0.441139854	4649/16384	0.283752
-0.1303527692	0.4423168627	563/1984	0.28377
-0.1303855201	0.4431967759	2325/8192	0.283813
-0.1300991704	0.4430040787	193/680	0.283824
-0.130589454	0.4437730845	109/384	0.283854
-0.1308427928	0.4439217134	4651/16384	0.283875
-0.1304799434	0.4445057016	1163/4096	0.283936
-0.1304064885	0.4443068475	577/2032	0.283957
-0.1302288124	0.4442210352	581/2046	0.283969
-0.1298254331	0.4447566668	4653/16384	0.283997
-0.1292944693	0.4455073918	2327/8192	0.284058
-0.1283456976	0.444878014	4655/16384	0.284119
-0.1287904808	0.4445240302	291/1024	0.28418
-0.1287904808	0.4445240302	291/1024	0.28418
-0.1290572498	0.4444938176	191/672	0.284226
-0.1292083394	0.4442995966	4657/16384	0.284241
-0.1292862524	0.4443703293	83/292	0.284247
-0.1287010948	0.4435530534	2329/8192	0.284302
-0.1279041041	0.4438806684	4659/16384	0.284363
-0.1270481416	0.4439198725	1165/4096	0.284424
-0.1262964498	0.444295628	4661/16384	0.284485
-0.1264482768	0.4446333957	437/1536	0.284505
-0.126470135	0.4452140983	2331/8192	0.284546
-0.1251488227	0.446005308	4663/16384	0.284607
-0.1250884389	0.4450334943	583/2048	0.284668
-0.1252613887	0.4444352377	4665/16384	0.284729
-0.1242845795	0.4442877778	565/1984	0.284778
-0.1243419415	0.4441111802	2333/8192	0.28479
-0.1243434921	0.4438158941	581/2040	0.284804
-0.1234927532	0.4444296315	4667/16384	0.284851
-0.1228679406	0.4434252327	547/1920	0.284896
-0.1230229502	0.4436312243	1167/4096	0.284912
-0.1233658132	0.4434576524	579/2032	0.284941
-0.1235221405	0.4435167	53/186	0.284946
-0.1232480138	0.4429286859	4669/16384	0.284973
-0.1231773588	0.4420719755	2335/8192	0.285034
-0.1240503599	0.4418951486	4671/16384	0.285095
-0.124049322	0.4423529129	73/256	0.285156
-0.124049322	0.4423529129	73/256	0.285156
-0.1239939067	0.4427164666	4673/16384	0.285217
-0.1240056812	0.4427116994	575/2016	0.285218
-0.1238909317	0.4428281167	583/2044	0.285225
-0.1246669654	0.4427773296	2337/8192	0.285278
-0.1249375082	0.4421462621	4675/16384	0.285339
-0.1255708697	0.4415091007	1169/4096	0.2854
-0.125918997	0.4401155466	4677/16384	0.285461
-0.1242043464	0.4401439639	2339/8192	0.285522
-0.1223887097	0.4398974836	4679/16384	0.285583
-0.1221375644	0.4383867345	585/2048	0.285645
-0.1213624778	0.4358846824	4681/16384	0.285706
-0.1190696307	0.4391962866	2341/8192	0.285767
-0.1177186364	0.4404354505	583/2040	0.285784
-0.1185329523	0.4403363565	567/1984	0.285786
-0.1196876759	0.4403431486	439/1536	0.285807
-0.120307297	0.4404984047	4683/16384	0.285828
-0.1201850672	0.4418034615	1171/4096	0.285889
-0.1192132024	0.4417258551	195/682	0.285924
-0.1193581267	0.4419906702	581/2032	0.285925
-0.1197400725	0.4424462706	183/640	0.285938
-0.1196805284	0.4428125049	4685/16384	0.28595
-0.1200044693	0.4440814379	2343/8192	0.286011
-0.1190459581	0.4448931748	4687/16384	0.286072
-0.1185618153	0.4443011269	293/1024	0.286133
-0.1185618153	0.4443011269	293/1024	0.286133
-0.1182891473	0.4436331533	4689/16384	0.286194
-0.1183038663	0.4431041715	585/2044	0.286204
-0.1178373174	0.4433103209	577/2016	0.28621
-0.1167500652	0.4445933164	2345/8192	0.286255
-0.1163016495	0.4435448641	513/1792	0.286272
-0.1179430332	0.4459290611	4691/16384	0.286316
-0.1188150718	0.4468154431	1173/4096	0.286377
-0.11974057	0.4470225285	4693/16384	0.286438
-0.1201210047	0.4461878391	2347/8192	0.286499
-0.1212925368	0.4460126105	4695/16384	0.28656
-0.1211353704	0.4468068035	587/2048	0.286621
-0.1208229082	0.4472396857	4697/16384	0.286682
-0.1215169518	0.4478342929	2349/8192	0.286743
-0.1215927462	0.448142545	39/136	0.286765
-0.1221421304	0.4476775344	569/1984	0.286794
-0.1224742604	0.4477877018	4699/16384	0.286804
-0.122730777	0.4488348814	1175/4096	0.286865
-0.1221554963	0.4488132033	587/2046	0.286901
-0.1223568054	0.4491025957	583/2032	0.286909
-0.1221079944	0.4494304203	4701/16384	0.286926
-0.1214646065	0.4502330582	551/1920	0.286979
-0.1216063031	0.4502097919	2351/8192	0.286987
-0.1209450216	0.4498332552	4703/16384	0.287048
-0.1211509888	0.4495345088	147/512	0.287109
-0.1211509888	0.4495345088	147/512	0.287109
-0.1213631726	0.44931803	4705/16384	0.28717
-0.1214193378	0.4492014981	587/2044	0.287182
-0.1211297024	0.4491922755	193/672	0.287202
-0.1208947472	0.4489834952	2353/8192	0.287231
-0.1204793394	0.4493328138	4707/16384	0.287292
-0.1199113036	0.4495561366	1177/4096	0.287354
-0.1198416579	0.4490709041	515/1792	0.287388
-0.1194000927	0.4501703146	4709/16384	0.287415
-0.1201758105	0.4506225088	2355/8192	0.287476
-0.1205722224	0.4514704774	4711/16384	0.287537
-0.1199903311	0.4517316549	589/2048	0.287598
-0.1192718456	0.4517854243	4713/16384	0.287659
-0.1201176141	0.4529234971	2357/8192	0.28772
-0.1204931901	0.4531102928	587/2040	0.287745
-0.1208841987	0.4525882379	4715/16384	0.287781
-0.1212327457	0.452413274	571/1984	0.287802
-0.1216035104	0.4530068051	1179/4096	0.287842
-0.1212948856	0.4534455078	19/66	0.287879
-0.1218304143	0.4535974345	585/2032	0.287894
-0.1216998869	0.4538857931	4717/16384	0.287903
-0.1222252644	0.4551906043	2359/8192	0.287964
-0.1207583666	0.4553858761	553/1920	0.288021
-0.1208379763	0.4554411442	4719/16384	0.288025
-0.1209012172	0.4548881877	295/1024	0.288086
-0.1209012172	0.4548881877	295/1024	0.288086
-0.1209966018	0.454492282	4721/16384	0.288147
-0.1208686532	0.4543415327	589/2044	0.28816
-0.1203655562	0.4545824246	83/288	0.288194
-0.1202795739	0.4544224544	2361/8192	0.288208
-0.1199936257	0.4550080891	4723/16384	0.288269
-0.1194596201	0.4553720394	1181/4096	0.28833
-0.1189502479	0.455835237	4725/16384	0.288391
-0.1191736012	0.4561247708	443/1536	0.288411
-0.1194280699	0.456618088	2363/8192	0.288452
-0.1184327654	0.4576531623	4727/16384	0.288513
-0.118215156	0.4568458791	591/2048	0.288574
-0.1182902098	0.4564075419	4729/16384	0.288635
-0.1176084876	0.4562215904	2365/8192	0.288696
-0.1172528295	0.456067992	589/2040	0.288725
-0.1169365501	0.4564568538	4731/16384	0.288757
-0.1166574398	0.4557750814	573/1984	0.28881
-0.1166207341	0.4558326725	1183/4096	0.288818
-0.1169369933	0.4556941489	197/682	0.288856
-0.1168610926	0.4554399026	587/2032	0.288878
-0.1168509868	0.4554484217	4733/16384	0.288879
-0.1169069353	0.4549521468	2367/8192	0.28894
-0.1173204899	0.4549542215	4735/16384	0.289001
-0.1172957285	0.4551508172	37/128	0.289062
-0.1172957285	0.4551508172	37/128	0.289062
-0.1172372471	0.4552927429	4737/16384	0.289124
-0.1172847969	0.4553943208	591/2044	0.289139
-0.1175398323	0.4553722477	2369/8192	0.289185
-0.1175445423	0.4553645006	583/2016	0.289187
-0.1176819673	0.4550916831	4739/16384	0.289246
-0.1179249426	0.4548323299	1185/4096	0.289307
-0.1180765794	0.4543596682	4741/16384	0.289368
-0.1174855973	0.4543198144	2371/8192	0.289429
-0.1169525405	0.4539977775	4743/16384	0.28949
-0.1171830804	0.4535862494	593/2048	0.289551
-0.1176702163	0.4532941294	4745/16384	0.289612
-0.1177451196	0.4535301952	519/1792	0.289621
-0.1163807704	0.4527808092	2373/8192	0.289673
-0.1157206106	0.4530421036	197/680	0.289706
-0.1159970747	0.4533236548	445/1536	0.289714
-0.1161594087	0.4536070988	4747/16384	0.289734
-0.115633456	0.4540430175	1187/4096	0.289795
-0.1155769631	0.4538701369	575/1984	0.289819
-0.1152095534	0.4537216892	593/2046	0.289834
-0.11496815	0.4541716924	4749/16384	0.289856
-0.1149060861	0.4540658676	589/2032	0.289862
-0.1143645344	0.4550979138	2375/8192	0.289917
-0.1131103694	0.4548111749	4751/16384	0.289978
-0.1134419905	0.4541166932	297/1024	0.290039
-0.1134419905	0.4541166932	297/1024	0.290039
-0.1138860354	0.4537861141	4753/16384	0.2901
-0.1138782235	0.4538441258	557/1920	0.290104
-0.1141246118	0.4533766781	593/2044	0.290117
-0.1131215584	0.4525783457	2377/8192	0.290161
-0.1137806541	0.4525205048	65/224	0.290179
-0.1114517362	0.4537623692	4755/16384	0.290222
-0.1100307821	0.4556831687	1189/4096	0.290283
-0.1105889577	0.4583918509	4757/16384	0.290344
-0.1127904559	0.4571867404	2379/8192	0.290405
-0.1145615243	0.4576436614	4759/16384	0.290466
-0.1141517959	0.4587212886	595/2048	0.290527
-0.1135503347	0.4592935557	4761/16384	0.290588
-0.1147796363	0.460315059	2381/8192	0.290649
-0.1158200799	0.4606530984	593/2040	0.290686
-0.1161439701	0.4599059948	4763/16384	0.29071
-0.1169716769	0.4608611942	1191/4096	0.290771
-0.1165470207	0.4613968485	595/2046	0.290811
-0.1169676892	0.4616960575	577/1984	0.290827
-0.1168375343	0.461753248	4765/16384	0.290833
-0.1169714218	0.4621322599	591/2032	0.290846
-0.1174154929	0.4628115532	2383/8192	0.290894
-0.1164842478	0.4635404602	4767/16384	0.290955
-0.1162416475	0.4629860154	149/512	0.291016
-0.1162416475	0.4629860154	149/512	0.291016
-0.1162465107	0.4625645849	4769/16384	0.291077
-0.115874379	0.4623889615	85/292	0.291096
-0.1153465858	0.462603121	2385/8192	0.291138
-0.1154490042	0.4625791814	559/1920	0.291146
-0.1145539278	0.462518165	587/2016	0.291171
-0.1151344913	0.4636695208	4771/16384	0.291199
-0.114543282	0.4650893544	1193/4096	0.29126
-0.1144328758	0.4683267629	4773/16384	0.291321
-0.1180068941	0.4656666743	2387/8192	0.291382
-0.1194329227	0.4640137485	4775/16384	0.291443
-0.1203885089	0.464441854	597/2048	0.291504
-0.1212071808	0.4651978231	4777/16384	0.291565
-0.1212890278	0.4629139311	2389/8192	0.291626
-0.1206061357	0.4625636784	7/24	0.291667
-0.1202746621	0.4627429973	4779/16384	0.291687
-0.1199772008	0.4619930025	1195/4096	0.291748
-0.1203674476	0.461751529	199/682	0.291789
-0.1203218036	0.4613772256	4781/16384	0.291809
-0.1201671626	0.4610516495	593/2032	0.291831
-0.1199656407	0.4610918994	579/1984	0.291835
-0.120308714	0.460247377	2391/8192	0.29187
-0.121498485	0.460402227	4783/16384	0.291931
-0.1212642773	0.4608447145	299/1024	0.291992
-0.1212642773	0.4608447145	299/1024	0.291992
-0.1210289031	0.461104679	4785/16384	0.292053
-0.1211746836	0.4612970685	597/2044	0.292074
-0.1215666666	0.4614869522	2393/8192	0.292114
-0.1219993647	0.4612731475	589/2016	0.292163
-0.1220884804	0.4610988235	4787/16384	0.292175
-0.1222470371	0.4610653374	187/640	0.292187
-0.1227492219	0.4609905086	1197/4096	0.292236
-0.1235460658	0.4607220743	4789/16384	0.292297
-0.1233846876	0.4602883997	449/1536	0.292318
-0.123261942	0.4596684808	2395/8192	0.292358
-0.1248507403	0.4586820816	4791/16384	0.292419
-0.1247857696	0.4598803407	599/2048	0.29248
-0.1244138071	0.4603750162	4793/16384	0.292542
-0.1250711952	0.4610590491	2397/8192	0.292603
-0.1255831332	0.4612278259	199/680	0.292647
-0.1260336729	0.4613829584	4795/16384	0.292664
-0.1257400423	0.4622393542	1199/4096	0.292725
-0.1254213767	0.462143328	599/2046	0.292766
-0.1252055361	0.4623270229	4797/16384	0.292786
-0.1251042167	0.4627383651	595/2032	0.292815
-0.1247800318	0.4626621084	581/1984	0.292843
-0.1247930995	0.4626927222	2399/8192	0.292847
-0.1244726007	0.4623814924	4799/16384	0.292908
-0.1246442782	0.462247967	75/256	0.292969
-0.1246442782	0.462247967	75/256	0.292969
-0.1248223114	0.462196281	4801/16384	0.29303
-0.1247794535	0.4620777547	599/2044	0.293053
-0.1246366419	0.4618526836	2401/8192	0.293091
-0.1242800115	0.4619922725	4803/16384	0.293152
-0.1242939048	0.4619816529	197/672	0.293155
-0.1238864871	0.4620369167	1201/4096	0.293213
-0.1239723154	0.4619966737	563/1920	0.293229
-0.1233904998	0.4623754035	4805/16384	0.293274
-0.123906541	0.4627651941	2403/8192	0.293335
-0.1241030598	0.4633564657	4807/16384	0.293396
-0.1236648312	0.4634957856	601/2048	0.293457
-0.1231842214	0.4632585599	4809/16384	0.293518
-0.1237979986	0.4647251645	2405/8192	0.293579
-0.1244310067	0.4644173814	451/1536	0.29362
-0.1243531706	0.464319043	599/2040	0.293627
-0.1244307626	0.4641384183	4811/16384	0.29364
-0.1250018781	0.4641424655	1203/4096	0.293701
-0.125114877	0.4644304443	601/2046	0.293744
-0.1254114974	0.4645190279	4813/16384	0.293762
-0.1260058598	0.4641666517	597/2032	0.293799
-0.1262804262	0.4644888946	2407/8192	0.293823
-0.1262864554	0.4648826149	583/1984	0.293851
-0.1264417263	0.4654027183	4815/16384	0.293884
-0.1259335379	0.4653522788	301/1024	0.293945
-0.1259335379	0.4653522788	301/1024	0.293945
-0.1256321494	0.4651107752	4817/16384	0.294006
-0.1254650738	0.4653604761	601/2044	0.294031
-0.1250676924	0.4657447127	2409/8192	0.294067
-0.1250670733	0.4654456391	527/1792	0.294085
-0.1262592961	0.4668770398	4819/16384	0.294128
-0.1270513144	0.4666889048	593/2016	0.294147
-0.1275541464	0.4667910248	1205/4096	0.294189
-0.1286114421	0.4661998028	4821/16384	0.29425
-0.1282288336	0.4657754683	113/384	0.294271
-0.1279548395	0.4652921845	2411/8192	0.294312
-0.1284462971	0.4639859934	4823/16384	0.294373
-0.1291928839	0.4647303001	603/2048	0.294434
-0.1291659738	0.465410767	4825/16384	0.294495
-0.130419254	0.4656571557	2413/8192	0.294556
-0.1311112947	0.4646876856	601/2040	0.294608
-0.1319294839	0.4647319006	4827/16384	0.294617
-0.1331652489	0.4663344648	1207/4096	0.294678
-0.1325721156	0.4668081857	201/682	0.294721
-0.1321064623	0.4674813648	4829/16384	0.294739
-0.1311445968	0.4693246475	599/2032	0.294783
-0.1313444252	0.4688344942	2415/8192	0.2948
-0.1305308756	0.4681401685	585/1984	0.294859
-0.1305087872	0.4681643263	4831/16384	0.294861
-0.130827894	0.4678259932	151/512	0.294922
-0.130827894	0.4678259932	151/512	0.294922
-0.1312241814	0.4676364237	4833/16384	0.294983
-0.1309074349	0.4674520526	603/2044	0.29501
-0.1306111782	0.467015074	2417/8192	0.295044
-0.1300134934	0.4674710301	4835/16384	0.295105
-0.1296480053	0.4678474651	85/288	0.295139
-0.12935788	0.4676528606	1209/4096	0.295166
-0.1294853234	0.4672642038	529/1792	0.295201
-0.1285721952	0.4683439413	4837/16384	0.295227
-0.1294455492	0.4688990636	2419/8192	0.295288
-0.1292983827	0.46915845	189/640	0.295312
-0.129524376	0.4699710525	4839/16384	0.295349
-0.1288199485	0.4698675543	605/2048	0.29541
-0.1284281257	0.4693401958	4841/16384	0.295471
-0.128006497	0.4711469757	2421/8192	0.295532
-0.1291108878	0.4712185585	201/680	0.295588
-0.1290682847	0.4713647315	4843/16384	0.295593
-0.1294741761	0.4723414179	1211/4096	0.295654
-0.1286254225	0.4730303114	4845/16384	0.295715
-0.1271027921	0.474171636	601/2032	0.295768
-0.1274867084	0.4743392839	2423/8192	0.295776
-0.1268372438	0.4730497953	4847/16384	0.295837
-0.127231438	0.4727786763	587/1984	0.295867
-0.1273372187	0.4729528337	303/1024	0.295898
-0.1273372187	0.4729528337	303/1024	0.295898
-0.1277444695	0.4729903686	4849/16384	0.295959
-0.1275793187	0.4726052392	605/2044	0.295988
-0.1275893895	0.4722530171	2425/8192	0.296021
-0.1269580179	0.4722162024	4851/16384	0.296082
-0.1264421862	0.4719157566	199/672	0.296131
-0.1265245932	0.4719252655	1213/4096	0.296143
-0.1259573493	0.4716176263	4853/16384	0.296204
-0.1258155663	0.4719253852	455/1536	0.296224
-0.1255711068	0.4722403177	2427/8192	0.296265
-0.1247180136	0.4717444024	4855/16384	0.296326
-0.1251175817	0.4713496468	569/1920	0.296354
-0.1251820151	0.4715198112	607/2048	0.296387
-0.1254653026	0.471536673	4857/16384	0.296448
-0.1254801603	0.4710862581	2429/8192	0.296509
-0.1252380619	0.4707344648	121/408	0.296569
-0.1252251624	0.4707420398	4859/16384	0.29657
-0.1254696619	0.4704715241	1215/4096	0.296631
-0.1256035259	0.4705398617	607/2046	0.296676
-0.1257025317	0.470537277	4861/16384	0.296692
-0.1259744182	0.4704442912	603/2032	0.296752
-0.1259764642	0.4704479362	2431/8192	0.296753
-0.126051172	0.4706764143	4863/16384	0.296814
-0.1259386337	0.4706881435	19/64	0.296875
-0.1259386337	0.4706881435	19/64	0.296875
-0.1258541184	0.4706559533	4865/16384	0.296936
-0.1258505172	0.470749575	607/2044	0.296967
-0.1258216115	0.4708447879	2433/8192	0.296997
-0.1260151385	0.4709087658	4867/16384	0.297058
-0.1262017007	0.4710295718	1217/4096	0.297119
-0.1262153207	0.4710255173	599/2016	0.297123
-0.1266503147	0.4710634176	4869/16384	0.29718
-0.1264492962	0.4706458371	2435/8192	0.297241
-0.1264992641	0.4702543806	4871/16384	0.297302
-0.1268000093	0.4702950538	609/2048	0.297363
-0.1267304613	0.4703929299	571/1920	0.297396
-0.1269593705	0.4706018622	4873/16384	0.297424
-0.1268592287	0.4705929722	533/1792	0.297433
-0.1269924189	0.4693671234	2437/8192	0.297485
-0.1264879611	0.4695133308	457/1536	0.297526
-0.1264579245	0.4696983618	4875/16384	0.297546
-0.1264797505	0.4696952799	607/2040	0.297549
-0.1261017034	0.4696259794	1219/4096	0.297607
-0.1260337949	0.469448378	203/682	0.297654
-0.1258958161	0.4693585247	4877/16384	0.297668
-0.1253716995	0.4693559526	2439/8192	0.297729
-0.1254098774	0.4693822151	605/2032	0.297736
-0.1252347597	0.4688065846	4879/16384	0.297791
-0.1255713512	0.4688198322	305/1024	0.297852
-0.1255713512	0.4688198322	305/1024	0.297852
-0.1255361741	0.4689275282	591/1984	0.297883
-0.1257569317	0.4689873719	4881/16384	0.297913
-0.1258914883	0.4687890736	87/292	0.297945
-0.12619548	0.468596745	2441/8192	0.297974
-0.1252392619	0.4676568453	4883/16384	0.298035
-0.1241634398	0.4680408569	1221/4096	0.298096
-0.1243812986	0.4676977181	601/2016	0.298115
-0.1236561581	0.4688308056	4885/16384	0.298157
-0.1243522147	0.4691263738	2443/8192	0.298218
-0.1244121157	0.4698034448	4887/16384	0.298279
-0.1239882088	0.4697165768	611/2048	0.29834
-0.1237923591	0.4694877743	4889/16384	0.298401
-0.1235597607	0.4697708095	191/640	0.298438
-0.1233708969	0.4698980696	2445/8192	0.298462
-0.123468671	0.4705214778	4891/16384	0.298523
-0.1233900914	0.4705264742	203/680	0.298529
-0.1229462375	0.4708416637	1223/4096	0.298584
-0.1227237139	0.4706273326	611/2046	0.298631
-0.1225435066	0.4705948192	4893/16384	0.298645
-0.121863037	0.4706045443	2447/8192	0.298706
-0.1220044262	0.4705377306	607/2032	0.29872
-0.1218858841	0.4699506247	4895/16384	0.298767
-0.1221677603	0.4700554249	153/512	0.298828
-0.1221677603	0.4700554249	153/512	0.298828
-0.122316348	0.470205249	4897/16384	0.298889
-0.1223137181	0.4701939097	593/1984	0.298891
-0.1224474402	0.4700322419	611/2044	0.298924
-0.1225780021	0.4698735844	2449/8192	0.29895
-0.1223125046	0.4694866773	4899/16384	0.299011
-0.1222108716	0.4688921827	1225/4096	0.299072
-0.1225252664	0.4690539175	67/224	0.299107
-0.1219404096	0.4675477696	4901/16384	0.299133
-0.1203730676	0.4694099041	2451/8192	0.299194
-0.1202582545	0.4711992532	4903/16384	0.299255
-0.1192965353	0.4715812851	613/2048	0.299316
-0.1180992209	0.4715130801	4905/16384	0.299377
-0.1201712573	0.4736357628	2453/8192	0.299438
-0.1209053395	0.4729373072	115/384	0.299479
-0.1208210183	0.4725455686	4907/16384	0.2995
-0.1210191931	0.4725892459	611/2040	0.29951
-0.1215719873	0.4725074413	1227/4096	0.299561
-0.1217837658	0.4728488842	613/2046	0.299609
-0.1219759961	0.4729433463	4909/16384	0.299622
-0.1229344462	0.4730585941	2455/8192	0.299683
-0.1228022174	0.4732603987	609/2032	0.299705
-0.1226999874	0.4740401294	4911/16384	0.299744
-0.1223544518	0.4737883833	307/1024	0.299805
-0.1223544518	0.4737883833	307/1024	0.299805
-0.1222040896	0.4735338462	4913/16384	0.299866
-0.1219881548	0.4737301329	595/1984	0.299899
-0.1219457115	0.4737732376	613/2044	0.299902
-0.1217448619	0.4739103797	2457/8192	0.299927
-0.1220069549	0.4744784448	4915/16384	0.299988
-0.1220417878	0.4750991503	1229/4096	0.300049
-0.1219776869	0.475923158	605/2016	0.300099
-0.1221832446	0.4760569689	4917/16384	0.30011
-0.1227325081	0.4758471444	461/1536	0.30013
-0.1233129941	0.4756504944	2459/8192	0.300171
-0.1242496917	0.4770444923	4919/16384	0.300232
-0.123266789	0.4770280999	615/2048	0.300293
-0.1228709764	0.476713564	4921/16384	0.300354
-0.1223205991	0.4773592474	2461/8192	0.300415
-0.1222638096	0.4782880564	4923/16384	0.300476
-0.1219392148	0.4785603792	613/2040	0.30049
-0.1212073338	0.4784094233	577/1920	0.300521
-0.1214047883	0.4784228786	1231/4096	0.300537
-0.1212243264	0.4780451331	205/682	0.300587
-0.1211412249	0.4779331883	4925/16384	0.300598
-0.1205689564	0.4775561807	2463/8192	0.300659
-0.1207772213	0.4774130561	611/2032	0.300689
-0.1208791781	0.4771419158	4927/16384	0.30072
-0.1210321772	0.4773094043	77/256	0.300781
-0.1210321772	0.4773094043	77/256	0.300781
-0.1210752446	0.4774764985	4929/16384	0.300842
-0.121287367	0.4773474035	615/2044	0.300881
-0.1214085364	0.4773051798	2465/8192	0.300903
-0.1213931657	0.4772925787	597/1984	0.300907
-0.1212843925	0.4769343782	4931/16384	0.300964
-0.1212550331	0.4765359679	1233/4096	0.301025
-0.1209847566	0.4758023007	4933/16384	0.301086
-0.1212063648	0.4757316711	607/2016	0.301091
-0.1204140758	0.4764981128	2467/8192	0.301147
-0.1196327508	0.4767322397	4935/16384	0.301208
-0.1195236513	0.4761356341	617/2048	0.30127
-0.1198943331	0.4757336663	4937/16384	0.301331
-0.1175029989	0.4754787144	2469/8192	0.301392
-0.1176473375	0.477148878	463/1536	0.301432
-0.1182979562	0.4771652097	4939/16384	0.301453
-0.1183101781	0.4777326757	41/136	0.301471
-0.1183962871	0.4783760224	1235/4096	0.301514
-0.1178239951	0.4789941449	193/640	0.301563
-0.1177823888	0.479171044	617/2046	0.301564
-0.1177105221	0.4795196731	4941/16384	0.301575
-0.1195685063	0.4812850691	2471/8192	0.301636
-0.1190482585	0.4825878832	613/2032	0.301673
-0.119474241	0.4832718196	4943/16384	0.301697
-0.1184488037	0.4831647296	309/1024	0.301758
-0.1184488037	0.4831647296	309/1024	0.301758
-0.1177673348	0.4826445761	4945/16384	0.301819
-0.1174207271	0.4841174736	617/2044	0.301859
-0.1172383641	0.4843385907	2473/8192	0.30188
-0.1170201353	0.4840511849	541/1792	0.301897
-0.1165830215	0.4873256338	599/1984	0.301915
-0.1186564683	0.4853271739	4947/16384	0.301941
-0.1223345729	0.4861459093	1237/4096	0.302002
-0.1239912755	0.4841723399	4949/16384	0.302063
-0.1229177898	0.4836839396	29/96	0.302083
-0.122201628	0.4830804394	2475/8192	0.302124
-0.122725049	0.4813524963	4951/16384	0.302185
-0.1235641796	0.4820001319	619/2048	0.302246
-0.1236714668	0.4826542591	4953/16384	0.302307
-0.1249417978	0.4823927004	2477/8192	0.302368
-0.1256630765	0.4809856651	4955/16384	0.302429
-0.126142615	0.4802255842	617/2040	0.302451
-0.1273941998	0.4810865736	1239/4096	0.30249
-0.127671885	0.4820385941	619/2046	0.302542
-0.1275516955	0.4824789695	4957/16384	0.302551
-0.1279943411	0.4843668139	581/1920	0.302604
-0.128174159	0.4842174024	2479/8192	0.302612
-0.1272316537	0.4844927814	615/2032	0.302657
-0.1269059416	0.4843349272	4959/16384	0.302673
-0.126942787	0.4838260713	155/512	0.302734
-0.126942787	0.4838260713	155/512	0.302734
-0.1271662243	0.4834760636	4961/16384	0.302795
-0.1265253816	0.4834826304	619/2044	0.302838
-0.1263318469	0.4832592722	2481/8192	0.302856
-0.1259910059	0.4840128585	4963/16384	0.302917
-0.1259300064	0.4839661717	601/1984	0.302923
-0.1254733315	0.4845771129	1241/4096	0.302979
-0.1254198961	0.4842142544	543/1792	0.303013
-0.124613721	0.4861831882	4965/16384	0.30304
-0.1259554662	0.4857889331	611/2016	0.303075
-0.1264582242	0.4859282716	2483/8192	0.303101
-0.1275771888	0.4870295413	4967/16384	0.303162
-0.1266787567	0.4875395688	621/2048	0.303223
-0.1259731531	0.4872316387	4969/16384	0.303284
-0.1265327011	0.490967185	2485/8192	0.303345
-0.1286705211	0.4894170762	4971/16384	0.303406
-0.1296819399	0.4879589449	619/2040	0.303431
-0.1308255528	0.4897793785	1243/4096	0.303467
-0.1317776212	0.4912732722	207/682	0.303519
-0.1310964066	0.492007699	4973/16384	0.303528
-0.1331903924	0.496674756	2487/8192	0.303589
-0.1278157267	0.4961021048	617/2032	0.303642
-0.1284056151	0.4958064008	583/1920	0.303646
-0.1284754722	0.4960438079	4975/16384	0.30365
-0.1293318668	0.4948449772	311/1024	0.303711
-0.1293318668	0.4948449772	311/1024	0.303711
-0.1302425338	0.4942847608	4977/16384	0.303772
-0.1284993612	0.4937008978	621/2044	0.303816
-0.1286902741	0.4930714275	2489/8192	0.303833
-0.1272765823	0.4939706715	4979/16384	0.303894
-0.1260296764	0.4944408386	603/1984	0.303931
-0.125989934	0.4939979337	1245/4096	0.303955
-0.1239137303	0.4935369978	4981/16384	0.304016
-0.1239385996	0.4946875278	467/1536	0.304036
-0.1236979904	0.4967233107	613/2016	0.304067
-0.1237042937	0.4958911181	2491/8192	0.304077
-0.1210304899	0.4948778384	4983/16384	0.304138
-0.1221169732	0.494256464	623/2048	0.304199
-0.1227548242	0.4942845903	4985/16384	0.30426
-0.1226565313	0.4932477634	2493/8192	0.304321
-0.1220173104	0.4925587947	4987/16384	0.304382
-0.1220531613	0.4917026652	207/680	0.304412
-0.1223748065	0.4919198335	1247/4096	0.304443
-0.1227533407	0.4919026553	623/2046	0.304497
-0.122803886	0.4919854994	4989/16384	0.304504
-0.1233144788	0.4917032043	2495/8192	0.304565
-0.1235161268	0.4921034528	4991/16384	0.304626
-0.1235186064	0.4921017757	619/2032	0.304626
-0.1233204648	0.492144168	39/128	0.304688
-0.1233204648	0.492144168	39/128	0.304688
-0.1231900218	0.4920823598	4993/16384	0.304749
-0.1232174406	0.492383339	89/292	0.304795
-0.1231189658	0.4924044267	2497/8192	0.30481
-0.1234794312	0.4925366402	4995/16384	0.304871
-0.1238367121	0.4927232546	1249/4096	0.304932
-0.1238485837	0.4926848236	605/1984	0.30494
-0.1252311946	0.4927755684	4997/16384	0.304993
-0.1242541314	0.4919140315	2499/8192	0.305054
-0.1242413598	0.4919485609	205/672	0.30506
-0.1241866333	0.4911617695	4999/16384	0.305115
-0.1247061746	0.4911496514	625/2048	0.305176
-0.1249570948	0.4915351943	5001/16384	0.305237
-0.1248542832	0.4915406564	547/1792	0.305246
-0.124774471	0.4887889832	2501/8192	0.305298
-0.1237644929	0.4896992426	469/1536	0.305339
-0.1239002126	0.4900993089	5003/16384	0.305359
-0.1233914285	0.490536795	623/2040	0.305392
-0.1231954448	0.490200601	1251/4096	0.30542
-0.1228081379	0.4899748086	625/2046	0.305474
-0.1227821286	0.4898426821	5005/16384	0.305481
-0.1218644748	0.4900094128	2503/8192	0.305542
-0.1215983589	0.4891366767	5007/16384	0.305603
-0.1216799183	0.4892251702	621/2032	0.30561
-0.1220691223	0.4891668073	313/1024	0.305664
-0.1220691223	0.4891668073	313/1024	0.305664
-0.1222816704	0.4893871998	5009/16384	0.305725
-0.1222574016	0.489372542	587/1920	0.305729
-0.1225469014	0.4888342659	625/2044	0.305773
-0.1227548954	0.4888738009	2505/8192	0.305786
-0.122195585	0.4879845671	5011/16384	0.305847
-0.1191201766	0.4874500707	1253/4096	0.305908
-0.1165830215	0.4873256338	607/1984	0.305948
-0.1182669087	0.4896849539	5013/16384	0.305969
-0.1200499325	0.489763791	2507/8192	0.30603
-0.1198470603	0.4899958239	617/2016	0.306052
-0.1203175649	0.4909831755	5015/16384	0.306091
-0.1195929163	0.4909062273	627/2048	0.306152
-0.1193199718	0.4905579602	5017/16384	0.306213
-0.1186699738	0.491160223	2509/8192	0.306274
-0.1186949736	0.4921902122	5019/16384	0.306335
-0.1177666986	0.4930390449	125/408	0.306373
-0.1177611844	0.4926099746	1255/4096	0.306396
-0.117304619	0.4921825302	19/62	0.306452
-0.1173448995	0.492097973	5021/16384	0.306458
-0.1164715598	0.4917491863	2511/8192	0.306519
-0.1168154358	0.4911187885	5023/16384	0.30658
-0.1169227872	0.4912066038	623/2032	0.306594
-0.1170302445	0.4913247732	157/512	0.306641
-0.1170302445	0.4913247732	157/512	0.306641
-0.1170751286	0.491523573	5025/16384	0.306702
-0.1174271803	0.4912686811	627/2044	0.306751
-0.117485083	0.4913266675	2513/8192	0.306763
-0.1174462762	0.491338207	589/1920	0.306771
-0.1173606525	0.4908396796	5027/16384	0.306824
-0.1173500035	0.490306219	1257/4096	0.306885
-0.1173257273	0.4886952236	5029/16384	0.306946
-0.1165830215	0.4873256338	609/1984	0.306956
-0.1160267956	0.4901636047	2515/8192	0.307007
-0.1152555936	0.4898051311	619/2016	0.307044
-0.1145935861	0.4909433823	5031/16384	0.307068
-0.1126769784	0.4904031839	629/2048	0.307129
-0.1118936548	0.4903810671	5033/16384	0.30719
-0.1110750179	0.4933458057	2517/8192	0.307251
-0.113544591	0.4928714255	5035/16384	0.307312
-0.1148315193	0.4935132013	209/680	0.307353
-0.1145033556	0.4936979979	1259/4096	0.307373
-0.1145585561	0.494663819	629/2046	0.307429
-0.1144068838	0.4946593171	5037/16384	0.307434
-0.115686148	0.4963808612	2519/8192	0.307495
-0.1134356894	0.4971823099	5039/16384	0.307556
-0.1132285609	0.4965697082	625/2032	0.307579
-0.1136372952	0.4963384301	315/1024	0.307617
-0.1136372952	0.4963384301	315/1024	0.307617
-0.1139684986	0.4959605847	5041/16384	0.307678
-0.1129530791	0.4955475314	629/2044	0.30773
-0.1130933393	0.4954549661	2521/8192	0.307739
-0.1122586744	0.4961113677	5043/16384	0.3078
-0.1120099701	0.4961517149	197/640	0.307812
-0.1112442163	0.496351554	1261/4096	0.307861
-0.1091399011	0.4956302347	5045/16384	0.307922
-0.1093880213	0.4972482206	473/1536	0.307943
-0.1103942397	0.497979058	611/1984	0.307964
-0.1096321471	0.4988017267	2523/8192	0.307983
-0.1052312849	0.4991473002	5047/16384	0.308044
-0.1066761639	0.4973769021	631/2048	0.308105
-0.1075662083	0.4972140413	5049/16384	0.308167
-0.1073088948	0.4957496437	2525/8192	0.308228
-0.1065222481	0.4945486735	5051/16384	0.308289
-0.1075365787	0.4937201032	37/120	0.308333
-0.1073729293	0.4938020241	1263/4096	0.30835
-0.1078857939	0.4940270827	631/2046	0.308407
-0.1078384853	0.4940437742	5053/16384	0.308411
-0.1084830701	0.4939312635	2527/8192	0.308472
-0.1085808408	0.4943704388	5055/16384	0.308533
-0.1084044656	0.4944575184	627/2032	0.308563
-0.1083850146	0.4943753552	79/256	0.308594
-0.1083850146	0.4943753552	79/256	0.308594
-0.1082793898	0.4943003264	5057/16384	0.308655
-0.1081646859	0.4946416385	631/2044	0.308708
-0.1081535611	0.4945912908	2529/8192	0.308716
-0.1084745746	0.4947782108	5059/16384	0.308777
-0.1088090701	0.4949913837	1265/4096	0.308838
-0.1087582761	0.494955428	593/1920	0.308854
-0.1102309749	0.495621199	5061/16384	0.308899
-0.1092987664	0.494334992	2531/8192	0.30896
-0.1093473337	0.4943856865	613/1984	0.308972
-0.1094061479	0.4936733832	5063/16384	0.309021
-0.109443119	0.4937270419	89/288	0.309028
-0.1098120758	0.4937580637	633/2048	0.309082
-0.1099624601	0.4940450423	5065/16384	0.309143
-0.1111678593	0.4920443436	2533/8192	0.309204
-0.1096296699	0.49238286	475/1536	0.309245
-0.1095397176	0.4927845786	5067/16384	0.309265
-0.1088292095	0.4925565227	631/2040	0.309314
-0.1089370314	0.4925585112	1267/4096	0.309326
-0.1087462957	0.4921136481	211/682	0.309384
-0.1087804966	0.492125952	5069/16384	0.309387
-0.1080673044	0.4917339438	2535/8192	0.309448
-0.1083951013	0.4911199984	5071/16384	0.309509
-0.108658426	0.4912827792	629/2032	0.309547
-0.1086143171	0.4913372783	317/1024	0.30957
-0.1086143171	0.4913372783	317/1024	0.30957
-0.1086425861	0.491525858	5073/16384	0.309631
-0.1091009987	0.4913763047	633/2044	0.309687
-0.1090754956	0.4914052966	2537/8192	0.309692
-0.1090337417	0.491495422	555/1792	0.30971
-0.1090434525	0.4908218247	5075/16384	0.309753
-0.109036784	0.4893075095	1269/4096	0.309814
-0.1076018125	0.4887189559	5077/16384	0.309875
-0.1075297324	0.4897573165	119/384	0.309896
-0.1074740652	0.490349184	2539/8192	0.309937
-0.1069910372	0.4906402452	615/1984	0.30998
-0.1063426716	0.4909118767	5079/16384	0.309998
-0.1057018809	0.490410814	625/2016	0.31002
-0.1063127575	0.4900413711	635/2048	0.310059
-0.1066443573	0.4897790839	5081/16384	0.31012
-0.1062035858	0.4890610159	2541/8192	0.310181
-0.1051817442	0.4885400847	5083/16384	0.310242
-0.1057417101	0.4874014671	211/680	0.310294
-0.1056047094	0.487352482	1271/4096	0.310303
-0.1062894808	0.4874980787	635/2046	0.310362
-0.1062680887	0.4874742099	5085/16384	0.310364
-0.1070141585	0.487364277	2543/8192	0.310425
-0.1070545149	0.487807117	5087/16384	0.310486
-0.1068429083	0.4878243389	631/2032	0.310531
-0.1068723864	0.4878078861	159/512	0.310547
-0.1068723864	0.4878078861	159/512	0.310547
-0.106763783	0.4877434604	5089/16384	0.310608
-0.1066638918	0.488042722	635/2044	0.310665
-0.1066798757	0.4880301597	2545/8192	0.310669
-0.1069674513	0.4881545246	5091/16384	0.31073
-0.1072307257	0.4883103453	1273/4096	0.310791
-0.1071238488	0.488372638	557/1792	0.310826
-0.1079109881	0.4889219317	5093/16384	0.310852
-0.1076297674	0.4878781287	2547/8192	0.310913
-0.1077481791	0.4878329891	199/640	0.310937
-0.107888402	0.4874676459	5095/16384	0.310974
-0.1079925675	0.4875144999	617/1984	0.310988
-0.1081404264	0.4875995605	209/672	0.311012
-0.1080959863	0.4876527247	637/2048	0.311035
-0.1081142696	0.487845951	5097/16384	0.311096
-0.1089227607	0.4877176385	2549/8192	0.311157
-0.1083837019	0.4871069252	5099/16384	0.311218
-0.1084322484	0.486633812	127/408	0.311275
-0.1084021758	0.4866223357	1275/4096	0.311279
-0.1087860233	0.4864929806	637/2046	0.311339
-0.1087830101	0.4864826294	5101/16384	0.31134
-0.109396898	0.4860657289	2551/8192	0.311401
-0.1095455586	0.4866393694	5103/16384	0.311462
-0.1093379023	0.4866173932	633/2032	0.311516
-0.1093481598	0.4866280062	319/1024	0.311523
-0.1093481598	0.4866280062	319/1024	0.311523
-0.109233503	0.4865727617	5105/16384	0.311584
-0.1091755613	0.4868271535	91/292	0.311644
-0.109180431	0.4868299249	2553/8192	0.311646
-0.1093995916	0.4869460503	5107/16384	0.311707
-0.1095390083	0.4871139032	1277/4096	0.311768
-0.1095818326	0.4874436503	5109/16384	0.311829
-0.109830539	0.4872701126	479/1536	0.311849
-0.1099960945	0.4871337082	2555/8192	0.31189
-0.1103303102	0.4874920528	5111/16384	0.311951
-0.1100915923	0.4876054353	599/1920	0.311979
-0.1100618987	0.4875417519	619/1984	0.311996
-0.1100796102	0.4875167934	629/2016	0.312004
-0.1100897574	0.487527095	639/2048	0.312012
-0.1099886351	0.4874762461	5113/16384	0.312073
-0.1099054698	0.4876540149	2557/8192	0.312134
-0.1099412379	0.4878462154	5115/16384	0.312195
-0.1097868787	0.4879236688	637/2040	0.312255
-0.1097870526	0.4879225486	1279/4096	0.312256
-0.1097170688	0.4878586434	213/682	0.312317
-0.1097171722	0.4878585022	5117/16384	0.312317
-0.1095949571	0.4878355639	2559/8192	0.312378
-0.1096119988	0.4877478236	5119/16384	0.312439
-0.1096474158	0.4877623331	5/16	0.3125
-0.1096474158	0.4877623331	5/16	0.3125
-0.1096620676	0.4877832959	5121/16384	0.312561
-0.1097033273	0.487740046	639/2044	0.312622
-0.109703403	0.4877400135	2561/8192	0.312622
-0.1096625036	0.4876861077	5123/16384	0.312683
-0.1096262288	0.4876222185	1281/4096	0.312744
-0.1096093155	0.4874105926	5125/16384	0.312805
-0.1094813992	0.4876867737	2563/8192	0.312866
-0.1093894829	0.4877996824	5127/16384	0.312927
-0.1093165	0.4877347269	641/2048	0.312988
-0.1093125603	0.4877391914	631/2016	0.312996
-0.1093243942	0.4877452649	621/1984	0.313004
-0.1093434722	0.4877263836	601/1920	0.313021
-0.1093199282	0.4876566005	5129/16384	0.313049
-0.1093358274	0.4876631875	561/1792	0.313058
-0.1087728301	0.4876777396	2565/8192	0.31311
-0.1091832908	0.4880604393	481/1536	0.313151
-0.1092604254	0.487978583	5131/16384	0.313171
-0.1093828696	0.4881003682	1283/4096	0.313232
-0.1093846834	0.4881021943	213/680	0.313235
-0.1093912415	0.4882329024	5133/16384	0.313293
-0.1093921052	0.4882339391	641/2046	0.313294
-0.1095898166	0.4883753712	2567/8192	0.313354
-0.109482587	0.4885921106	5135/16384	0.313416
-0.1093983572	0.4885050421	321/1024	0.313477
-0.1093983572	0.4885050421	321/1024	0.313477
-0.109394159	0.4885091931	637/2032	0.313484
-0.1093931567	0.4884333345	5137/16384	0.313538
-0.1092232797	0.4884507888	2569/8192	0.313599
-0.109219918	0.4884514472	641/2044	0.313601
-0.1091848914	0.4887063558	5139/16384	0.31366
-0.1091437285	0.4898655116	1285/4096	0.313721
-0.1105569203	0.4893633419	5141/16384	0.313782
-0.1099319125	0.4887789868	2571/8192	0.313843
-0.1101021871	0.4884232548	5143/16384	0.313904
-0.1102842196	0.4885594928	643/2048	0.313965
-0.1102506217	0.4885617649	211/672	0.313988
-0.110266822	0.4886400077	623/1984	0.314012
-0.1103082214	0.4886983041	5145/16384	0.314026
-0.1104854632	0.4886373351	201/640	0.314063
-0.1105995335	0.4886131982	2573/8192	0.314087
-0.1107056978	0.4882917709	5147/16384	0.314148
-0.1110382056	0.4882215802	1287/4096	0.314209
-0.1110343963	0.4882040197	641/2040	0.314216
-0.1111655209	0.4884149602	5149/16384	0.31427
-0.1111680017	0.4884090412	643/2046	0.314272
-0.1114984447	0.4885901375	2575/8192	0.314331
-0.111318238	0.4888450537	5151/16384	0.314392
-0.1112419472	0.4887443761	161/512	0.314453
-0.1112419472	0.4887443761	161/512	0.314453
-0.1112495443	0.4887573121	639/2032	0.314469
-0.1112330072	0.4886649892	5153/16384	0.314514
-0.1110664053	0.4887149208	2577/8192	0.314575
-0.1110691021	0.4887207494	643/2044	0.314579
-0.1110689279	0.4889103394	5155/16384	0.314636
-0.1110069397	0.4891290279	1289/4096	0.314697
-0.1104712385	0.4896773024	5157/16384	0.314758
-0.1115951888	0.4893869601	2579/8192	0.314819
-0.1124997558	0.4890101124	5159/16384	0.31488
-0.1141835641	0.489172427	645/2048	0.314941
-0.1152555936	0.4898051311	635/2016	0.31498
-0.1151136681	0.4888589114	5161/16384	0.315002
-0.1165830215	0.4873256338	625/1984	0.31502
-0.1135647855	0.4866671966	2581/8192	0.315063
-0.1127096349	0.487345965	121/384	0.315104
-0.1127357111	0.4877216489	5163/16384	0.315125
-0.1121478155	0.4876010141	1291/4096	0.315186
-0.1121642946	0.4876467653	643/2040	0.315196
-0.1119780058	0.4872661222	5165/16384	0.315247
-0.1119810596	0.4872813669	215/682	0.315249
-0.1114015094	0.4870525476	2583/8192	0.315308
-0.1116358398	0.4865332035	5167/16384	0.315369
-0.1117993412	0.4866983967	323/1024	0.31543
-0.1117993412	0.4866983967	323/1024	0.31543
-0.1117646227	0.4867033136	641/2032	0.315453
-0.1118373736	0.4868402194	5169/16384	0.315491
-0.1121330191	0.4867031223	2585/8192	0.315552
-0.1121134643	0.4867034076	645/2044	0.315558
-0.1120543472	0.4863518209	5171/16384	0.315613
-0.1120634928	0.4859979545	1293/4096	0.315674
-0.1121826522	0.4854128982	5173/16384	0.315735
-0.1117383477	0.4854950177	485/1536	0.315755
-0.1113828319	0.4856178883	2587/8192	0.315796
-0.1108726792	0.4848713064	5175/16384	0.315857
-0.1113839016	0.4848428767	647/2048	0.315918
-0.1115594479	0.4849401433	91/288	0.315972
-0.1115821631	0.484995297	5177/16384	0.315979
-0.1118119292	0.4845839853	627/1984	0.316028
-0.1118739485	0.4846362112	2589/8192	0.31604
-0.1118763322	0.4841054151	5179/16384	0.316101
-0.1125042656	0.4839559553	607/1920	0.316146
-0.1123884683	0.4839598596	1295/4096	0.316162
-0.1123029083	0.4839586471	43/136	0.316176
-0.1125636261	0.4842315677	5181/16384	0.316223
-0.1125454798	0.4842168896	647/2046	0.316227
-0.112920107	0.4844580351	2591/8192	0.316284
-0.1127376812	0.4846965226	5183/16384	0.316345
-0.1126547815	0.4846045825	81/256	0.316406
-0.1126547815	0.4846045825	81/256	0.316406
-0.1126885364	0.4845887145	643/2032	0.316437
-0.1126360174	0.4845207191	5185/16384	0.316467
-0.1124622803	0.4846029784	2593/8192	0.316528
-0.1124782204	0.4845945742	647/2044	0.316536
-0.1125146703	0.4848002086	5187/16384	0.316589
-0.1125233949	0.4850108792	1297/4096	0.31665
-0.1124922849	0.4854837413	5189/16384	0.316711
-0.1129859487	0.4850767747	2595/8192	0.316772
-0.1134626853	0.4849761145	5191/16384	0.316833
-0.1134845864	0.4853245121	649/2048	0.316895
-0.113276613	0.4854923816	5193/16384	0.316956
-0.1132588977	0.4854369121	71/224	0.316964
-0.1146815871	0.486429579	2597/8192	0.317017
-0.1165830215	0.4873256338	629/1984	0.317036
-0.114870469	0.4848803634	487/1536	0.317057
-0.1143675538	0.4848222617	5195/16384	0.317078
-0.1143623146	0.4839388304	1299/4096	0.317139
-0.1143345546	0.4841458479	647/2040	0.317157
-0.1148074888	0.4835128661	203/640	0.317188
-0.1149044081	0.4831078386	5197/16384	0.3172
-0.1148550729	0.483262943	59/186	0.317204
-0.1133208269	0.4818303266	2599/8192	0.317261
-0.1129357276	0.4802882437	5199/16384	0.317322
-0.113807199	0.4800371546	325/1024	0.317383
-0.113807199	0.4800371546	325/1024	0.317383
-0.1138687151	0.4806226703	645/2032	0.317421
-0.1145661854	0.4802940272	5201/16384	0.317444
-0.114510004	0.4783842045	2601/8192	0.317505
-0.1146462274	0.4787873502	649/2044	0.317515
-0.1149187293	0.4786007523	569/1792	0.317522
-0.1125093357	0.4783355084	5203/16384	0.317566
-0.1103604614	0.4791190734	1301/4096	0.317627
-0.1095859875	0.4807076339	5205/16384	0.317688
-0.1111230423	0.4811807102	2603/8192	0.317749
-0.111194355	0.4823800588	5207/16384	0.31781
-0.110564863	0.482205186	651/2048	0.317871
-0.1103413057	0.4819109908	5209/16384	0.317932
-0.1101081984	0.4820669793	641/2016	0.317956
-0.1097950906	0.4823761734	2605/8192	0.317993
-0.1098162347	0.4828913929	631/1984	0.318044
-0.1097648244	0.4831546056	5211/16384	0.318054
-0.1090085664	0.4834545278	1303/4096	0.318115
-0.1090899954	0.4833602937	649/2040	0.318137
-0.10865966	0.483035368	5213/16384	0.318176
-0.1086998121	0.4830230234	7/22	0.318182
-0.1080260131	0.4825614068	611/1920	0.318229
-0.1080283023	0.4826460784	2607/8192	0.318237
-0.1083306091	0.4822401978	5215/16384	0.318298
-0.1084769511	0.4823877138	163/512	0.318359
-0.1084769511	0.4823877138	163/512	0.318359
-0.1084728018	0.4824630379	647/2032	0.318406
-0.1085168819	0.4825222694	5217/16384	0.31842
-0.1087963287	0.4823730391	2609/8192	0.318481
-0.1087905693	0.4824116289	93/292	0.318493
-0.1086963222	0.4820479142	5219/16384	0.318542
-0.1086590554	0.4816812511	1305/4096	0.318604
-0.1088110511	0.4817448396	571/1792	0.318638
-0.1086095201	0.4809721592	5221/16384	0.318665
-0.107885235	0.4816501911	2611/8192	0.318726
-0.1072136171	0.4818438812	5223/16384	0.318787
-0.1071309301	0.4814137877	653/2048	0.318848
-0.1073053218	0.4811296595	5225/16384	0.318909
-0.1066131053	0.4808916712	643/2016	0.318948
-0.1061935037	0.4809066814	2613/8192	0.31897
-0.1062606317	0.4819082793	5227/16384	0.319031
-0.1063638722	0.4822544482	633/1984	0.319052
-0.1058874716	0.4826133026	1307/4096	0.319092
-0.1057650895	0.4824606875	217/680	0.319118
-0.1051943738	0.4826472446	5229/16384	0.319153
-0.1051818449	0.4825617061	653/2046	0.319159
-0.1038838117	0.483199462	2615/8192	0.319214
-0.1038108724	0.4818991306	613/1920	0.319271
-0.1037606246	0.4819475472	5231/16384	0.319275
-0.1041768074	0.4820570507	327/1024	0.319336
-0.1041768074	0.4820570507	327/1024	0.319336
-0.1043536848	0.4821385553	649/2032	0.31939
-0.104384071	0.4822072562	5233/16384	0.319397
-0.1046133799	0.4817298493	2617/8192	0.319458
-0.1046882314	0.4817774227	653/2044	0.319472
-0.104237718	0.4813607771	5235/16384	0.319519
-0.1040412664	0.4808839265	1309/4096	0.31958
-0.1040056334	0.4802843704	5237/16384	0.319641
-0.1035027773	0.4803144854	491/1536	0.319661
-0.102953522	0.480525005	2619/8192	0.319702
-0.1022691696	0.4793009685	5239/16384	0.319763
-0.1030037747	0.4793662906	655/2048	0.319824
-0.1032512299	0.4795683385	5241/16384	0.319885
-0.1036477298	0.4791207185	215/672	0.31994
-0.1036300929	0.4791539466	2621/8192	0.319946
-0.1037271903	0.4785767104	5243/16384	0.320007
-0.1042881235	0.4785913758	635/1984	0.32006
-0.1042733931	0.478553374	1311/4096	0.320068
-0.1041915688	0.4786800659	653/2040	0.320098
-0.104398201	0.4788125888	5245/16384	0.320129
-0.10435784	0.4788354706	655/2046	0.320137
-0.1046887288	0.4790219562	2623/8192	0.32019
-0.1045509412	0.4792312328	5247/16384	0.320251
-0.1044704787	0.4791600917	41/128	0.320312
-0.1044704787	0.4791600917	41/128	0.320312
-0.1044454096	0.4790937741	651/2032	0.320374
-0.1044455103	0.4790942686	5249/16384	0.320374
-0.1043049022	0.4791772144	2625/8192	0.320435
-0.1042933469	0.4791388642	655/2044	0.32045
-0.1043672967	0.4793456276	5251/16384	0.320496
-0.1044055984	0.4795400755	1313/4096	0.320557
-0.10445128	0.4798659599	5253/16384	0.320618
-0.1048138496	0.4795168388	2627/8192	0.320679
-0.1051593363	0.4793531991	5255/16384	0.32074
-0.1052608753	0.4795885178	657/2048	0.320801
-0.1051853165	0.479775963	5257/16384	0.320862
-0.1051478384	0.4797484953	575/1792	0.320871
-0.106001705	0.4797981742	2629/8192	0.320923
-0.1058158768	0.4799049088	647/2016	0.320933
-0.1059510152	0.4790857053	493/1536	0.320964
-0.1056709592	0.4791127283	5259/16384	0.320984
-0.1055923066	0.4786498578	1315/4096	0.321045
-0.1056769703	0.4786948275	637/1984	0.321069
-0.1057494909	0.4786913675	131/408	0.321078
-0.1057859935	0.4783079856	5261/16384	0.321106
-0.105852847	0.478352427	219/682	0.321114
-0.1055483287	0.4775802225	2631/8192	0.321167
-0.1062716392	0.4771905903	5263/16384	0.321228
-0.106335849	0.4776065141	329/1024	0.321289
-0.106335849	0.4776065141	329/1024	0.321289
-0.1062269585	0.4778224111	5265/16384	0.32135
-0.1062262819	0.477803047	617/1920	0.321354
-0.1061807835	0.4778061121	653/2032	0.321358
-0.1067165688	0.4780991	2633/8192	0.321411
-0.1065844823	0.4781507986	9/28	0.321429
-0.1073664341	0.4774756094	5267/16384	0.321472
-0.1082983598	0.4756371489	1317/4096	0.321533
-0.1065686888	0.4729821092	5269/16384	0.321594
-0.1053676611	0.475652751	2635/8192	0.321655
-0.1040124436	0.4764700754	5271/16384	0.321716
-0.1035476201	0.4756043236	659/2048	0.321777
-0.1036398621	0.474953862	5273/16384	0.321838
-0.1021694232	0.4749602417	2637/8192	0.321899
-0.1015744632	0.4747421017	649/2016	0.321925
-0.1014719716	0.4762676945	5275/16384	0.32196
-0.1000394753	0.4764318127	1319/4096	0.322021
-0.1001760134	0.4758288421	219/680	0.322059
-0.0993757395	0.4758587857	639/1984	0.322077
-0.0994202669	0.4757181102	5277/16384	0.322083
-0.0995757156	0.4755041425	659/2046	0.322092
-0.0979542877	0.4752996792	2639/8192	0.322144
-0.0981922838	0.4740088551	5279/16384	0.322205
-0.0987334549	0.4742492072	165/512	0.322266
-0.0987334549	0.4742492072	165/512	0.322266
-0.0989445753	0.4745178073	5281/16384	0.322327
-0.0991351078	0.474642962	655/2032	0.322343
-0.0995438126	0.473998982	2641/8192	0.322388
-0.0994990113	0.4740482846	619/1920	0.322396
-0.09969168859999999	0.4742975848	659/2044	0.322407
-0.0991123601	0.4730984448	5283/16384	0.322449
-0.0986780601	0.4717026876	1321/4096	0.32251
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-0.0956823501	0.4730739225	2643/8192	0.322632
-0.0947620021	0.4756973855	5287/16384	0.322693
-0.0929435398	0.4756411948	661/2048	0.322754
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-0.0947359447	0.4798077147	31/96	0.322917
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-0.0970934395	0.4800894578	661/2046	0.323069
-0.0978343008	0.4795840162	641/1984	0.323085
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-0.0977130302	0.4812181279	5297/16384	0.323303
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-0.097331327	0.4826905163	207/640	0.323437
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-0.0963573762	0.4880637425	1327/4096	0.323975
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-0.0956937566	0.4869740314	643/1984	0.324093
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-0.0965092865	0.4868475561	663/2044	0.324364
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-0.0786353034	0.5196634885	1369/4096	0.334229
-0.0782651799	0.5191693602	599/1792	0.334263
-0.0768422399	0.5211497722	5477/16384	0.33429
-0.0831277619	0.5214616869	2739/8192	0.334351
-0.0873420519	0.5203692749	5479/16384	0.334412
-0.0878197083	0.5225160055	685/2048	0.334473
-0.0869447089	0.5235569416	5481/16384	0.334534
-0.0906902935	0.525206301	2741/8192	0.334595
-0.0925669118	0.5202552837	5483/16384	0.334656
-0.0938521981	0.5159296485	1371/4096	0.334717
-0.0968436263	0.5153335986	5485/16384	0.334778
-0.0979118016	0.5143963251	685/2046	0.3348
-0.0966404261	0.5131395897	683/2040	0.334804
-0.1016581716	0.5113344749	2743/8192	0.334839
-0.1033829465	0.5164617972	643/1920	0.334896
-0.1035665239	0.5162552403	5487/16384	0.3349
-0.1018380836	0.5160791685	343/1024	0.334961
-0.1018380836	0.5160791685	343/1024	0.334961
-0.1010874599	0.515438338	5489/16384	0.335022
-0.100155778	0.5174530199	2745/8192	0.335083
-0.1003854736	0.5187580814	685/2044	0.335127
-0.1017660777	0.5185369518	681/2032	0.335138
-0.1018933805	0.5189816113	5491/16384	0.335144
-0.1035747665	0.5202454931	665/1984	0.335181
-0.1030941633	0.5206778784	1373/4096	0.335205
-0.1027109387	0.5223665946	5493/16384	0.335266
-0.101256135	0.5227160746	515/1536	0.335286
-0.1079441582	0.5219149085	2747/8192	0.335327
-0.1108586957	0.5270043876	5495/16384	0.335388
-0.1082747297	0.5265152704	687/2048	0.335449
-0.1076224893	0.5255471218	5497/16384	0.33551
-0.1060729397	0.5269999581	2749/8192	0.335571
-0.1055770872	0.5289971965	5499/16384	0.335632
-0.1037999504	0.5292457985	1375/4096	0.335693
-0.1035406023	0.5284069425	5501/16384	0.335754
-0.1031423053	0.5281896882	229/682	0.335777
-0.102750693	0.5282670622	137/408	0.335784
-0.1025778727	0.5276230432	677/2016	0.335813
-0.102571658	0.5276038923	2751/8192	0.335815
-0.103157564	0.527038789	5503/16384	0.335876
-0.1033065715	0.5273202576	43/128	0.335938
-0.1033065715	0.5273202576	43/128	0.335938
-0.1032411272	0.5275037162	5505/16384	0.335999
-0.1037456939	0.5275334843	2753/8192	0.33606
-0.1040440098	0.5272345046	687/2044	0.336106
-0.1038609409	0.5269285363	5507/16384	0.336121
-0.1038520239	0.5269268041	683/2032	0.336122
-0.103933766	0.5262823527	1377/4096	0.336182
-0.1038978051	0.5262696935	667/1984	0.33619
-0.1045137233	0.5257764382	5509/16384	0.336243
-0.1024974935	0.5258848184	2755/8192	0.336304
-0.1011862274	0.5263217061	5511/16384	0.336365
-0.1010155941	0.525550239	689/2048	0.336426
-0.1013993925	0.525193145	5513/16384	0.336487
-0.100006802	0.5241793315	2757/8192	0.336548
-0.101256135	0.5227160746	517/1536	0.336589
-0.0990272987	0.5267315894	5515/16384	0.336609
-0.0994963556	0.5287260107	1379/4096	0.33667
-0.0988355834	0.5298593743	5517/16384	0.336731
-0.0991609036	0.5307109043	689/2046	0.336755
-0.0998165282	0.5308962094	229/680	0.336765
-0.0999127636	0.5323163462	2759/8192	0.336792
-0.0997070326	0.5320539876	97/288	0.336806
-0.0977686627	0.5332986989	5519/16384	0.336853
-0.0977801851	0.5323057331	345/1024	0.336914
-0.0977801851	0.5323057331	345/1024	0.336914
-0.0981954999	0.5319714902	5521/16384	0.336975
-0.0981693911	0.5319928319	647/1920	0.336979
-0.0971618099	0.5310945742	2761/8192	0.337036
-0.095767174	0.5308634939	689/2044	0.337084
-0.0956109492	0.5321789203	5523/16384	0.337097
-0.0954113801	0.5318179021	685/2032	0.337106
-0.0935122898	0.5337912858	1381/4096	0.337158
-0.0938476112	0.5325283512	669/1984	0.337198
-0.0903076233	0.5330162579	5525/16384	0.337219
-0.0997681026	0.5390267261	2763/8192	0.33728
-0.1046971785	0.5354486983	5527/16384	0.337341
-0.1062101403	0.5376761983	691/2048	0.337402
-0.1056561961	0.5392339165	5529/16384	0.337463
-0.109334324	0.5392237999	2765/8192	0.337524
-0.111503963	0.5363769722	5531/16384	0.337585
-0.1147988653	0.5364737149	1383/4096	0.337646
-0.1149679003	0.5383313656	5533/16384	0.337708
-0.1160492272	0.5390436009	691/2046	0.337732
-0.1169768434	0.5398234453	689/2040	0.337745
-0.1166804194	0.5407986286	2767/8192	0.337769
-0.1157861042	0.5408619025	227/672	0.337798
-0.1147915055	0.5415590352	5535/16384	0.33783
-0.1147636782	0.5407886583	173/512	0.337891
-0.1147636782	0.5407886583	173/512	0.337891
-0.1151309348	0.5404593358	5537/16384	0.337952
-0.1140443698	0.5398740039	2769/8192	0.338013
-0.1140890804	0.5399421616	649/1920	0.338021
-0.1130195415	0.5405023312	691/2044	0.338063
-0.1131545039	0.5410278496	5539/16384	0.338074
-0.1128080362	0.5413824007	687/2032	0.338091
-0.1123221943	0.5422574259	1385/4096	0.338135
-0.1107243703	0.5423797073	5541/16384	0.338196
-0.1109738449	0.5420202884999999	671/1984	0.338206
-0.1150272965	0.5449576843	2771/8192	0.338257
-0.1186382091	0.5453844703	5543/16384	0.338318
-0.1179905288	0.5472145512	693/2048	0.338379
-0.1167570393	0.5473758739	5545/16384	0.33844
-0.1180321759	0.5504490107	2773/8192	0.338501
-0.1240765036	0.5494677219	5547/16384	0.338562
-0.1274337551	0.5385591629	1387/4096	0.338623
-0.1281065018	0.5340967439	5549/16384	0.338684
-0.1255565984	0.5327948453	21/62	0.33871
-0.1225739713	0.5310583118	691/2040	0.338725
-0.1238785507	0.5282982898	2775/8192	0.338745
-0.1273455413	0.5249020957	683/2016	0.33879
-0.1298329679	0.5261982983	5551/16384	0.338806
-0.1293528495	0.5284424689	347/1024	0.338867
-0.1293528495	0.5284424689	347/1024	0.338867
-0.1281573741	0.5293064293	5553/16384	0.338928
-0.1308577437	0.5311704137	2777/8192	0.338989
-0.1327708854	0.5294510703999999	99/292	0.339041
-0.1334398332	0.5287946063	5555/16384	0.33905
-0.1341601165	0.528504512	217/640	0.339062
-0.1340638014	0.5267606559	689/2032	0.339075
-0.1357384463	0.5274447582	1389/4096	0.339111
-0.1376191244	0.5287499581	5557/16384	0.339172
-0.1373058578	0.5299434878	521/1536	0.339193
-0.137124927	0.5222525241	673/1984	0.339214
-0.1377714511	0.5197225697	2779/8192	0.339233
-0.1452551551	0.5123456713	5559/16384	0.339294
-0.1455309638	0.5182522229	695/2048	0.339355
-0.1432503818	0.5199636283	5561/16384	0.339417
-0.1462491346	0.5234101438	2781/8192	0.339478
-0.1509127282	0.5261584037	5563/16384	0.339539
-0.149560391	0.5299418145	1391/4096	0.3396
-0.1476278688	0.529339375	5565/16384	0.339661
-0.1469759853	0.5308180376	695/2046	0.339687
-0.1449125919	0.5311392907	231/680	0.339706
-0.145199641	0.5305021327	2783/8192	0.339722
-0.1446108834	0.5288292253	685/2016	0.339782
-0.1446134372	0.528802471	5567/16384	0.339783
-0.1454031382	0.5287977316	87/256	0.339844
-0.1454031382	0.5287977316	87/256	0.339844
-0.1457615044	0.5292791709	5569/16384	0.339905
-0.1465754697	0.5280139357	2785/8192	0.339966
-0.1452866344	0.5273671595	695/2044	0.34002
-0.1450015271	0.526995195	5571/16384	0.340027
-0.1436380773	0.5272765786	691/2032	0.340059
-0.1436400778	0.5263671728	1393/4096	0.340088
-0.1437852084	0.5265947555	653/1920	0.340104
-0.1434085651	0.5245679018	5573/16384	0.340149
-0.1418226521	0.5293508392	2787/8192	0.34021
-0.1415885874	0.5291135281	675/1984	0.340222
-0.1418846208	0.5318728246	5575/16384	0.340271
-0.1405183439	0.5315402881	697/2048	0.340332
-0.1402837175	0.5305465719	5577/16384	0.340393
-0.1378433422	0.531650977	2789/8192	0.340454
-0.1373058578	0.5299434878	523/1536	0.340495
-0.1414513364	0.5366010909	5579/16384	0.340515
-0.1445238826	0.5360339668	1395/4096	0.340576
-0.1453886383	0.5374766075	5581/16384	0.340637
-0.14697853	0.536813075	697/2046	0.340665
-0.1492157361	0.53827281	139/408	0.340686
-0.1484941651	0.5384049014	2791/8192	0.340698
-0.1470145626	0.5406294953	5583/16384	0.340759
-0.1467721824	0.5402052244	229/672	0.340774
-0.1465315227	0.5397207672	349/1024	0.34082
-0.1465315227	0.5397207672	349/1024	0.34082
-0.1467939468	0.5390450194	5585/16384	0.340881
-0.1451618153	0.5390767086	2793/8192	0.340942
-0.1453779037	0.5389258355	611/1792	0.34096
-0.1449701304	0.5407115772	697/2044	0.340998
-0.1448469584	0.5409077264	5587/16384	0.341003
-0.1449066611	0.5423144351	693/2032	0.341043
-0.1445423915	0.5423058444	1397/4096	0.341064
-0.1433320102	0.5425906275	5589/16384	0.341125
-0.1429070292	0.5420637876	131/384	0.341146
-0.1510971038	0.5475148156	2795/8192	0.341187
-0.1544404212	0.5439281551	677/1984	0.34123
-0.1570190278	0.5412325687	5591/16384	0.341248
-0.1582244976	0.5456936609	699/2048	0.341309
-0.156180927	0.5471904413	5593/16384	0.34137
-0.1592492197	0.5505239931	2797/8192	0.341431
-0.1650748907	0.5539526144	5595/16384	0.341492
-0.1636906651	0.5604174513	1399/4096	0.341553
-0.160448444	0.5588391616	5597/16384	0.341614
-0.1570999353	0.5604563424	233/682	0.341642
-0.1558034802	0.5584075801	41/120	0.341667
-0.1558526314	0.5587831459	2799/8192	0.341675
-0.1565336289	0.5563536056	5599/16384	0.341736
-0.1576603402	0.5564701314	689/2016	0.341766
-0.1574155345	0.5569079424	175/512	0.341797
-0.1574155345	0.5569079424	175/512	0.341797
-0.1573767783	0.5577362822	5601/16384	0.341858
-0.1593855438	0.5568130962	2801/8192	0.341919
-0.1578547654	0.5545717867	699/2044	0.341977
-0.1581034325	0.5544780223	5603/16384	0.34198
-0.1564075389	0.55319041	695/2032	0.342028
-0.1567877613	0.553310581	1401/4096	0.342041
-0.1573778467	0.5534507386	613/1792	0.342076
-0.1570431429	0.5517317658	5605/16384	0.342102
-0.1534613656	0.5551526011	2803/8192	0.342163
-0.1527449944	0.5553299687	219/640	0.342187
-0.151924265	0.5570282859	5607/16384	0.342224
-0.1516461053	0.5566220236	679/1984	0.342238
-0.1514653088	0.5560081961	701/2048	0.342285
-0.1518893343	0.5554123797	5609/16384	0.342346
-0.1503656276	0.5549600098	2805/8192	0.342407
-0.147198729	0.5570792218	5611/16384	0.342468
-0.1479425493	0.560584182	1403/4096	0.342529
-0.1459653895	0.5607880005	5613/16384	0.34259
-0.1443528104	0.562837485	701/2046	0.34262
-0.1423744982	0.562038997	233/680	0.342647
-0.1421304765	0.5622431675	2807/8192	0.342651
-0.142758806	0.5593158109	5615/16384	0.342712
-0.1436142828	0.5599983808	691/2016	0.342758
-0.1434633524	0.5599095222	351/1024	0.342773
-0.1434633524	0.5599095222	351/1024	0.342773
-0.1434828213	0.5605930254	5617/16384	0.342834
-0.1448156875	0.5597507376	2809/8192	0.342896
-0.1442001107	0.5583760315	701/2044	0.342955
-0.1442015311	0.5584166053	5619/16384	0.342957
-0.1439097218	0.5575604029	697/2032	0.343012
-0.1438672463	0.5575758575	1405/4096	0.343018
-0.1442957654	0.557117828	5621/16384	0.343079
-0.144600672	0.5571525266	527/1536	0.343099
-0.1419959355	0.5561821922	2811/8192	0.34314
-0.1411708249	0.5538474554	5623/16384	0.343201
-0.1424348709	0.5540507314999999	659/1920	0.343229
-0.142330508	0.5543801788	681/1984	0.343246
-0.1421951593	0.5543123977	703/2048	0.343262
-0.1423092641	0.5548688913	5625/16384	0.343323
-0.1431987561	0.5544169662	2813/8192	0.343384
-0.1437604517	0.5535618168	5627/16384	0.343445
-0.1446032361	0.5536144633	1407/4096	0.343506
-0.1445669867	0.5540707403	5629/16384	0.343567
-0.144955556	0.5543189289	703/2046	0.343597
-0.1449261388	0.5546978997999999	701/2040	0.343627
-0.14492739	0.5546953019	2815/8192	0.343628
-0.1444550194	0.5548348119	5631/16384	0.343689
-0.1444775688	0.5546391352	11/32	0.34375
-0.1444775688	0.5546391352	11/32	0.34375
-0.144602393	0.5545751752	5633/16384	0.343811
-0.1443338273	0.5543540808	2817/8192	0.343872
-0.1440281729	0.554651564	703/2044	0.343933
-0.1440291379	0.5546529826	5635/16384	0.343933
-0.1438253678	0.5549522487	1409/4096	0.343994
-0.1438245855	0.5549470842000001	699/2032	0.343996
-0.1434731149	0.5549267281	5637/16384	0.344055
-0.1444823146	0.5556719775	2819/8192	0.344116
-0.1453294067	0.5557453407	5639/16384	0.344177
-0.1451630243	0.5561742678	705/2048	0.344238
-0.1452291669	0.5561656034	683/1984	0.344254
-0.14514651	0.5560416536	661/1920	0.344271
-0.1448433453	0.5561768577	5641/16384	0.344299
-0.1448723562	0.5561327549	617/1792	0.344308
-0.1450592976	0.5569920166	2821/8192	0.34436
-0.144600672	0.5571525266	529/1536	0.344401
-0.1481109376	0.556440864	5643/16384	0.344421
-0.146912331	0.5546167268	1411/4096	0.344482
-0.1473955703	0.5540130065	5645/16384	0.344543
-0.1468522851	0.5533456053	235/682	0.344575
-0.1470033018	0.55258652	2823/8192	0.344604
-0.1469871621	0.5525400333	703/2040	0.344608
-0.1483044867	0.5524314859	5647/16384	0.344666
-0.1480647433	0.5529330513	353/1024	0.344727
-0.1480647433	0.5529330513	353/1024	0.344727
-0.1481385226	0.5529226044	695/2016	0.344742
-0.1477097084	0.5529909479	5649/16384	0.344788
-0.1481041929	0.55372387	2825/8192	0.344849
-0.1491688168	0.5534462827	5651/16384	0.34491
-0.1491571012	0.5533980192	705/2044	0.344912
-0.1501168525	0.5531366867	1413/4096	0.344971
-0.1502073415	0.5530499299	701/2032	0.34498
-0.1506764671	0.5538540575	5653/16384	0.345032
-0.147253936	0.547273207	2827/8192	0.345093
-0.1448212392	0.5504638293	5655/16384	0.345154
-0.1441836971	0.5493056689	707/2048	0.345215
-0.1446607323	0.5489720337	685/1984	0.345262
-0.1445465473	0.5485111409	5657/16384	0.345276
-0.1433210634	0.548389535	221/640	0.345313
-0.1428681102	0.5484138448	2829/8192	0.345337
-0.1415818976	0.5495587205	5659/16384	0.345398
-0.1400738875	0.5493376912	1415/4096	0.345459
-0.140197687	0.5484026134	5661/16384	0.34552
-0.1394420922	0.5478428672	707/2046	0.345552
-0.139593274	0.5468694726	2831/8192	0.345581
-0.1394321626	0.5468919477	47/136	0.345588
-0.1407567263	0.5467907658	5663/16384	0.345642
-0.1406096001	0.547212393	177/512	0.345703
-0.1406096001	0.547212393	177/512	0.345703
-0.1405648236	0.547079969	697/2016	0.345734
-0.1403102187	0.547310581	5665/16384	0.345764
-0.140806784	0.5478760001	2833/8192	0.345825
-0.1415514354	0.5474011493	5667/16384	0.345886
-0.1415021667	0.5474409186	101/292	0.34589
-0.142159547	0.5469451812	1417/4096	0.345947
-0.142037365	0.5469052592	703/2032	0.345965
-0.1428408763	0.5472861828	5669/16384	0.346008
-0.1413169107	0.5449379171	2835/8192	0.346069
-0.1394730061	0.5438523869	5671/16384	0.34613
-0.1404483647	0.5430501077	709/2048	0.346191
-0.1411664929	0.5434446319	5673/16384	0.346252
-0.1412471707	0.5437557594	687/1984	0.34627
-0.1419020232	0.5415548452	2837/8192	0.346313
-0.1429070292	0.5420637876	133/384	0.346354
-0.136309512	0.5385983184	5675/16384	0.346375
-0.1324383752	0.5476195928	1419/4096	0.346436
-0.1325509476	0.5508012606	5677/16384	0.346497
-0.1347434234	0.5514968003	709/2046	0.34653
-0.1357174749	0.5533244404	2839/8192	0.346558
-0.1356699499	0.5530021261	707/2040	0.346569
-0.1334194974	0.5552066965	5679/16384	0.346619
-0.1331960793	0.5541253562	355/1024	0.34668
-0.1331960793	0.5541253562	355/1024	0.34668
-0.1335982972	0.553950548	233/672	0.346726
-0.1336807608	0.5535488511	5681/16384	0.346741
-0.1318899154	0.5530338151	2841/8192	0.346802
-0.1311397356	0.5549495736	5683/16384	0.346863
-0.1309383323	0.5548242864	709/2044	0.346869
-0.1307189696	0.5563721576	1421/4096	0.346924
-0.1306725541	0.556019673	705/2032	0.346949
-0.1296588851	0.556693958	5685/16384	0.346985
-0.1291161046	0.5563221187	533/1536	0.347005
-0.1324539383	0.5596645817	2843/8192	0.347046
-0.1331870281	0.5642746921	5687/16384	0.347107
-0.1311787778	0.5630311739	711/2048	0.347168
-0.1312278504	0.5619119512	5689/16384	0.347229
-0.129202934	0.5625038619	689/1984	0.347278
-0.1291866945	0.5622588079	2845/8192	0.34729
-0.1273612797	0.5635928563	5691/16384	0.347351
-0.1253873228	0.5622305204	667/1920	0.347396
-0.1255175886	0.5625744151	1423/4096	0.347412
-0.1260714492	0.5616914635	5693/16384	0.347473
-0.1257947897	0.5608373295	237/682	0.347507
-0.1260814706	0.5601577348	2847/8192	0.347534
-0.1260057896	0.5603770511	709/2040	0.347549
-0.1270350984	0.5603803065	5695/16384	0.347595
-0.1268220417	0.5606929707	89/256	0.347656
-0.1268220417	0.5606929707	89/256	0.347656
-0.126569005	0.5606880908	5697/16384	0.347717
-0.1265655287	0.5606870751	701/2016	0.347718
-0.1268105106	0.5613011476	2849/8192	0.347778
-0.1275900721	0.5610793127	5699/16384	0.347839
-0.1276602363	0.5612007035	711/2044	0.347847
-0.1282313584	0.5607135856	1425/4096	0.3479
-0.1281583142	0.5609409765	707/2032	0.347933
-0.1288633721	0.5609939384	5701/16384	0.347961
-0.1277811366	0.5589641028	2851/8192	0.348022
-0.1264725511	0.5579767129	5703/16384	0.348083
-0.1271510842	0.5574319134	713/2048	0.348145
-0.1276597124	0.5577093418	5705/16384	0.348206
-0.12807944	0.5561494769	2853/8192	0.348267
-0.1281633177	0.5565285994	691/1984	0.348286
-0.1291161046	0.5563221187	535/1536	0.348307
-0.1247005018	0.5552349473	5707/16384	0.348328
-0.1226885184	0.5578379489	1427/4096	0.348389
-0.1213803367	0.557635839	223/640	0.348438
-0.1209907393	0.5580468129	5709/16384	0.34845
-0.1204075209	0.5597193643	23/66	0.348485
-0.1192365249	0.5611369154	2855/8192	0.348511
-0.1196976096	0.5604862205	237/680	0.348529
-0.116771444	0.5592274649	5711/16384	0.348572
-0.1179274973	0.5587756356	357/1024	0.348633
-0.1179274973	0.5587756356	357/1024	0.348633
-0.1185300387	0.5591794513	5713/16384	0.348694
-0.1187327705	0.5594331706	703/2016	0.34871
-0.1190309848	0.557465868	2857/8192	0.348755
-0.1191198994	0.5577242904	625/1792	0.348772
-0.1170249774	0.5562729676	5715/16384	0.348816
-0.1174634946	0.5557551088	713/2044	0.348826
-0.1147202919	0.5550730011	1429/4096	0.348877
-0.1160923147	0.5551919664	709/2032	0.348917
-0.1147123548	0.5525669034	5717/16384	0.348938
-0.1088567722	0.564037415	2859/8192	0.348999
-0.1200114302	0.570339036	5719/16384	0.34906
-0.119228047	0.5766809758	715/2048	0.349121
-0.1139470842	0.5784092747	5721/16384	0.349182
-0.1270485701	0.5847975042	2861/8192	0.349243
-0.1316988275	0.57985907	693/1984	0.349294
-0.1328511765	0.5774675565	5723/16384	0.349304
-0.1389903747	0.5761034498	1431/4096	0.349365
-0.1399527426	0.5794108761	5725/16384	0.349426
-0.143882519	0.5838701246	671/1920	0.349479
-0.1441334581	0.5834236789	2863/8192	0.349487
-0.1431007691	0.5833270903	713/2040	0.34951
-0.1409937637	0.5854374951	5727/16384	0.349548
-0.1407629304	0.5839695589	179/512	0.349609
-0.1407629304	0.5839695589	179/512	0.349609
-0.1415867984	0.583368218	5729/16384	0.34967
-0.1405087355	0.5825507624	235/672	0.349702
-0.1392539656	0.582081995	2865/8192	0.349731
-0.1372075526	0.5848288089	5731/16384	0.349792
-0.1363732502	0.5854423948	715/2044	0.349804
-0.1363545775	0.5882522368	1433/4096	0.349854
-0.1360935226	0.5871415706000001	627/1792	0.349888
-0.1341062637	0.5875992989	711/2032	0.349902
-0.1330387694	0.5896044429	5733/16384	0.349915
-0.1439253084	0.5909012013	2867/8192	0.349976
-0.1482007282	0.5887811312	5735/16384	0.350037
-0.1483279044	0.590610349	717/2048	0.350098
-0.1472949098	0.5912680029	5737/16384	0.350159
-0.14964594	0.5926531107	2869/8192	0.35022
-0.1527532228	0.5912192266	5739/16384	0.350281
-0.1542391493	0.5878026347	695/1984	0.350302
-0.1564738673	0.585535892	1435/4096	0.350342
-0.1599672106	0.5856520552	5741/16384	0.350403
-0.1643552012	0.5817001807	239/682	0.35044
-0.167447336	0.5833440119	2871/8192	0.350464
-0.1667030668	0.5857124653	143/408	0.35049
-0.1651541766	0.5890534746	673/1920	0.350521
-0.1654300741	0.589098485	5743/16384	0.350525
-0.1643735079	0.5876361462	359/1024	0.350586
-0.1643735079	0.5876361462	359/1024	0.350586
-0.1647557435	0.5862831949	5745/16384	0.350647
-0.1622295703	0.5876441529999999	101/288	0.350694
-0.1617629124	0.5873338103	2873/8192	0.350708
-0.16225314	0.5901461795	5747/16384	0.350769
-0.162500678	0.5907834404	717/2044	0.350783
-0.1626801667	0.5917306619	1437/4096	0.35083
-0.1619779169	0.5923032573	713/2032	0.350886
-0.1618852421	0.5922765824	5749/16384	0.350891
-0.1615069163	0.5922368909	539/1536	0.350911
-0.1649613649	0.5955584677	2875/8192	0.350952
-0.1648115391	0.6006630498	5751/16384	0.351013
-0.1634791749	0.5989813988	719/2048	0.351074
-0.1638563889	0.5979132798	5753/16384	0.351135
-0.161908856	0.5980016975	2877/8192	0.351196
-0.160255224	0.598783271	5755/16384	0.351257
-0.1589406441	0.59803999	697/1984	0.35131
-0.1588299466	0.5980965601	1439/4096	0.351318
-0.1592786298	0.5974325495	5757/16384	0.351379
-0.1590604033	0.5963921649	719/2046	0.351417
-0.15932443	0.5960785509	2879/8192	0.35144
-0.1596013093	0.5962990269	239/680	0.351471
-0.1601984092	0.5963701718	5759/16384	0.351501
-0.1599384672	0.5966180567	45/128	0.351562
-0.1599384672	0.5966180567	45/128	0.351562
-0.1596990615	0.5965290633	5761/16384	0.351624
-0.1597781108	0.5971773439	2881/8192	0.351685
-0.1597707884	0.5971825934	709/2016	0.351687
-0.1606120411	0.597191044	5763/16384	0.351746
-0.1608927237	0.5970871343	719/2044	0.351761
-0.1612560725	0.5968887116	1441/4096	0.351807
-0.1617061203	0.5972234677	5765/16384	0.351868
-0.1617322692	0.5972204019	715/2032	0.35187
-0.1611028645	0.5949371788	2883/8192	0.351929
-0.1596456955	0.5940605274	5767/16384	0.35199
-0.1602362002	0.5935410784	721/2048	0.352051
-0.160724658	0.5938151281	5769/16384	0.352112
-0.1606436624	0.5938549963999999	631/1792	0.352121
-0.1608772345	0.5923932823	2885/8192	0.352173
-0.1615069163	0.5922368909	541/1536	0.352214
-0.1585971778	0.5913112868	5771/16384	0.352234
-0.1559778949	0.5943789403	1443/4096	0.352295
-0.156113524	0.5937317129	699/1984	0.352319
-0.1546678063	0.595128357	5773/16384	0.352356
-0.154744482	0.5971003235	721/2046	0.352395
-0.154273464	0.5977717243	2887/8192	0.352417
-0.1537320149	0.5972754549	719/2040	0.352451
-0.1523153165	0.5970536012	5775/16384	0.352478
-0.1529743172	0.5965541843	361/1024	0.352539
-0.1529743172	0.5965541843	361/1024	0.352539
-0.1534711729	0.5967951678	5777/16384	0.3526
-0.1534451713	0.596765205	677/1920	0.352604
-0.1534968852	0.5954080136	2889/8192	0.352661
-0.1536010877	0.5955812913	79/224	0.352679
-0.1517291363	0.5950513964	5779/16384	0.352722
-0.1511250621	0.5950106365	103/292	0.35274
-0.1501487211	0.5952990804	1445/4096	0.352783
-0.1494632632	0.5942758473	5781/16384	0.352844
-0.1497480243	0.5943156141	717/2032	0.352854
-0.1485402086	0.60100026	2891/8192	0.352905
-0.1557525341	0.6029440066	5783/16384	0.352966
-0.1558266896	0.6056971852	723/2048	0.353027
-0.1540607825	0.6070563341	5785/16384	0.353088
-0.1578319031	0.6080638213	2893/8192	0.353149
-0.1604801658	0.6072135402	5787/16384	0.35321
-0.1626819519	0.6083606947	1447/4096	0.353271
-0.162014943	0.6094065961	701/1984	0.353327
-0.1618934423	0.6093825468	5789/16384	0.353333
-0.1618991655	0.6111443767	241/682	0.353372
-0.1615026563	0.6114942398	2895/8192	0.353394
-0.1611164391	0.6109763046	721/2040	0.353431
-0.1602821948	0.6108339986	5791/16384	0.353455
-0.1607233806	0.6105325198	181/512	0.353516
-0.1607233806	0.6105325198	181/512	0.353516
-0.1610486459	0.6107376721	5793/16384	0.353577
-0.1611043816	0.6097265067	2897/8192	0.353638
-0.1610532962	0.6097672354	679/1920	0.353646
-0.1613331191	0.609478022	713/2016	0.353671
-0.1598449159	0.6095050567	5795/16384	0.353699
-0.1592875168	0.6095993673	723/2044	0.353718
-0.1587940107	0.6098903924	1449/4096	0.35376
-0.1581285831	0.6093406249	5797/16384	0.353821
-0.1580799262	0.609068603	719/2032	0.353839
-0.1587377586	0.6126887714	2899/8192	0.353882
-0.1604413259	0.6140997833	5799/16384	0.353943
-0.1596639306	0.6145264227	725/2048	0.354004
-0.1591889219	0.6141425269	5801/16384	0.354065
-0.1589195338	0.615546514	2901/8192	0.354126
-0.160327136	0.6168612304	5803/16384	0.354187
-0.1652488756	0.6167417031	1451/4096	0.354248
-0.1692128507	0.6184172641	5805/16384	0.354309
-0.1720386761	0.6148595911	703/1984	0.354335
-0.1721150858	0.6100232681	725/2046	0.35435
-0.1733694014	0.6080843129	2903/8192	0.35437
-0.1771164713	0.6095961719	241/680	0.354412
-0.182106301	0.6093484555	5807/16384	0.354431
-0.17963833	0.6120114494	363/1024	0.354492
-0.17963833	0.6120114494	363/1024	0.354492
-0.1771401109	0.6111763083	5809/16384	0.354553
-0.1788858558	0.6185406206	2905/8192	0.354614
-0.1847739717	0.6230862142	715/2016	0.354663
-0.1865554492	0.6163617061	5811/16384	0.354675
-0.1882449136	0.6155756244	227/640	0.354687
-0.1887709311	0.6143751795	725/2044	0.354697
-0.1903374025	0.6139563796	1453/4096	0.354736
-0.1920959531	0.6158806204	5813/16384	0.354797
-0.1921368486	0.6167027742	545/1536	0.354818
-0.1941813512	0.6168707342	721/2032	0.354823
-0.1983492521	0.5951169886	2907/8192	0.354858
-0.1907626429	0.5742702799	5815/16384	0.354919
-0.2007595543	0.5773343931	727/2048	0.35498
-0.2012948124	0.5836622141	5817/16384	0.355042
-0.2113020813	0.5789855244	2909/8192	0.355103
-0.2211679431	0.5699021452	5819/16384	0.355164
-0.2293337633	0.5713068914	1455/4096	0.355225
-0.2275949229	0.5754429446	5821/16384	0.355286
-0.2326760682	0.5825436397	727/2046	0.355327
-0.2303613515	0.5827358364	705/1984	0.355343
-0.2306380196	0.5830034819	2911/8192	0.355347
-0.2265318906	0.5840428928	145/408	0.355392
-0.2246704686	0.5840013691	5823/16384	0.355408
-0.2257386859	0.5815143368	91/256	0.355469
-0.2257386859	0.5815143368	91/256	0.355469
-0.2278906396	0.5815285244	5825/16384	0.35553
-0.2254311461	0.5770112859	2913/8192	0.355591
-0.2186604868	0.5799764305	5827/16384	0.355652
-0.2191442043	0.5797619098	239/672	0.355655
-0.2184707364	0.5832773897	727/2044	0.355675
-0.2161473951	0.5836221373	1457/4096	0.355713
-0.2169514845	0.5839093046	683/1920	0.355729
-0.2128674879	0.5823422133	5829/16384	0.355774
-0.2099752645	0.5867697236	723/2032	0.355807
-0.2275487609	0.5969680206	2915/8192	0.355835
-0.2354087476	0.5920461912	5831/16384	0.355896
-0.2354575988	0.5953426354	729/2048	0.355957
-0.2331102311	0.5965840965	5833/16384	0.356018
-0.237808569	0.5991276597	2917/8192	0.356079
-0.2377029135	0.6003763153	547/1536	0.35612
-0.2442315718	0.5957399859	5835/16384	0.35614
-0.2456384546	0.5808355662	1459/4096	0.356201
-0.2465115762	0.5783232971	5837/16384	0.356262
-0.2446781076	0.5715318739	243/682	0.356305
-0.2466422708	0.5727379057	2919/8192	0.356323
-0.2476723578	0.5739166992	707/1984	0.356351
-0.2498312421	0.5745795083	727/2040	0.356373
-0.2500257239	0.5751422306	5839/16384	0.356384
-0.2486473919	0.5756544935	365/1024	0.356445
-0.2486473919	0.5756544935	365/1024	0.356445
-0.2475832917	0.5748001798	5841/16384	0.356506
-0.2476536612	0.5777920848	2921/8192	0.356567
-0.2474420638	0.5775081949	639/1792	0.356585
-0.2506802557	0.5779445929	5843/16384	0.356628
-0.251152009	0.5777771804	719/2016	0.356647
-0.2515037075	0.5770691444	729/2044	0.356654
-0.2517053116	0.5776415767	1461/4096	0.356689
-0.2519119368	0.5783056223	5845/16384	0.35675
-0.2518251803	0.5784450316	137/384	0.356771
-0.253687283	0.5782753201	725/2032	0.356791
-0.2565390419	0.5738477158	2923/8192	0.356812
-0.2567454461	0.5520011158	5847/16384	0.356873
-0.2645779793	0.5413111767	731/2048	0.356934
-0.2704544347	0.5429910526	5849/16384	0.356995
-0.2714134524	0.5342037605	2925/8192	0.357056
-0.2719923799	0.5123277795	5851/16384	0.357117
-0.2832918443	0.5028329475	1463/4096	0.357178
-0.2862196461	0.5137143839	5853/16384	0.357239
-0.3002688808	0.5397115374	731/2046	0.357283
-0.2979675973	0.5325721033	2927/8192	0.3573
-0.2852663975	0.5345912751	243/680	0.357353
-0.286442031	0.5326650675	709/1984	0.357359
-0.2861119086	0.532955574	5855/16384	0.357361
-0.2877758762	0.5279408142999999	183/512	0.357422
-0.2877758762	0.5279408143	183/512	0.357422
-0.2936263516	0.5280476933	5857/16384	0.357483
-0.2835147397	0.5174984002	2929/8192	0.357544
-0.27592083	0.5315370296	5859/16384	0.357605
-0.2793141613	0.5360512664	731/2044	0.357632
-0.2781183287	0.5352793737	103/288	0.357639
-0.276002812	0.5352504009	1465/4096	0.357666
-0.2758670919	0.5336038471	641/1792	0.357701
-0.2731539302	0.5355154966	5861/16384	0.357727
-0.2861633389	0.5448771301999999	727/2032	0.357776
-0.2874853668	0.5453367911	2931/8192	0.357788
-0.2886434242	0.5461112301	229/640	0.357812
-0.2929206973	0.5470813011	5863/16384	0.357849
-0.2903423942	0.5479438254	733/2048	0.35791
-0.2889316624	0.5467771341	5865/16384	0.357971
-0.2883166118	0.5496534038	2933/8192	0.358032
-0.2904776996	0.5542463519	5867/16384	0.358093
-0.3082481042	0.5750318692	1467/4096	0.358154
-0.3088019092	0.5812850673	5869/16384	0.358215
-0.3049393158	0.6040942139	733/2046	0.35826
-0.3062874682	0.5993187527	2935/8192	0.358276
-0.2992704371	0.5887145306	43/120	0.358333
-0.2987975581	0.5891297191	5871/16384	0.358337
-0.3027446048	0.5869452804	711/1984	0.358367
-0.3029227213	0.5889823308	367/1024	0.358398
-0.3029227213	0.5889823308	367/1024	0.358398
-0.305152126	0.592834152	5873/16384	0.358459
-0.3066283757	0.5830275302	2937/8192	0.358521
-0.2985009406	0.5823118637	5875/16384	0.358582
-0.2962712445	0.5837690236999999	733/2044	0.358611
-0.2964644392	0.582644274	241/672	0.358631
-0.296714924	0.5828066275	1469/4096	0.358643
-0.2965720256	0.5816469948	5877/16384	0.358704
-0.2967043795	0.5814766356	551/1536	0.358724
-0.2848389563	0.5845618902	729/2032	0.35876
-0.2853530715	0.5844878443	2939/8192	0.358765
-0.2768352379	0.5854535751	5879/16384	0.358826
-0.2797966336	0.5814564353	689/1920	0.358854
-0.280045685	0.582900295	735/2048	0.358887
-0.2823881079	0.5838412906	5881/16384	0.358948
-0.2821824699	0.5800144627	2941/8192	0.359009
-0.2808461478	0.5745279139	5883/16384	0.35907
-0.281752415	0.571326892	1471/4096	0.359131
-0.2835123819	0.572705654	5885/16384	0.359192
-0.29031538	0.5728189669	245/682	0.359238
-0.2886763565	0.5733426047	2943/8192	0.359253
-0.2866687991	0.5766192603	733/2040	0.359314
-0.2866863573	0.5766353935	5887/16384	0.359314
-0.2860292799	0.5751575178	23/64	0.359375
-0.2860292799	0.5751575178	23/64	0.359375
-0.2870197396	0.57408591	5889/16384	0.359436
-0.2837601835	0.5737768773	2945/8192	0.359497
-0.2831419242	0.5781141477	5891/16384	0.359558
-0.2848452729	0.5792770266	105/292	0.359589
-0.283971643	0.5794621713	1473/4096	0.359619
-0.2838666335	0.579463681	725/2016	0.359623
-0.2830212662	0.5800569542	5893/16384	0.35968
-0.2925595364	0.5806900282	2947/8192	0.359741
-0.2925169682	0.5803813338	731/2032	0.359744
-0.2950456847	0.5766142355	5895/16384	0.359802
-0.295534256	0.5787582997	737/2048	0.359863
-0.2951507231	0.5779509758	691/1920	0.359896
-0.2942507659	0.5797021226	5897/16384	0.359924
-0.294219167	0.5794843761	645/1792	0.359933
-0.2968609376	0.5809757241	2949/8192	0.359985
-0.2967043795	0.5814766356	553/1536	0.360026
-0.3028480034	0.5788529039	5899/16384	0.360046
-0.2912814251	0.5579533121	1475/4096	0.360107
-0.2884147626	0.557120702	5901/16384	0.360168
-0.2798645257	0.560484148	67/186	0.360215
-0.2816679392	0.5583497474	2951/8192	0.360229
-0.2833056567	0.5531011203	5903/16384	0.360291
-0.2830315776	0.5526603568	49/136	0.360294
-0.2845493905	0.5549585687	369/1024	0.360352
-0.2845493905	0.5549585687	369/1024	0.360352
-0.2836658933	0.5542764993	715/1984	0.360383
-0.2836088037	0.5567483065	5905/16384	0.360413
-0.2878096321	0.5559488555	2953/8192	0.360474
-0.2873042811	0.5510644	5907/16384	0.360535
-0.2853907557	0.5497934433	737/2044	0.360568
-0.2866986055	0.5497515608	1477/4096	0.360596
-0.2861663959	0.5498365414	727/2016	0.360615
-0.2876944608	0.549412006	5909/16384	0.360657
-0.2748418344	0.5448893	2955/8192	0.360718
-0.2772413011	0.5440407289	733/2032	0.360728
-0.2648438841	0.5663188994	5911/16384	0.360779
-0.2618205883	0.5723114783	739/2048	0.36084
-0.259149225	0.5729176199	5913/16384	0.360901
-0.2608184454	0.5756323176	231/640	0.360938
-0.2610995771	0.5760953363	2957/8192	0.360962
-0.2637334437	0.5804478121	5915/16384	0.361023
-0.2633368431	0.5836458455	1479/4096	0.361084
-0.2615378358	0.5826301939	5917/16384	0.361145
-0.2568282672	0.5833886894	739/2046	0.361193
-0.2575078824	0.5826331274	2959/8192	0.361206
-0.2584229052	0.5800963683	5919/16384	0.361267
-0.2582381013	0.5803732286	737/2040	0.361275
-0.2591717347	0.5809950876	185/512	0.361328
-0.2591717347	0.5809950876	185/512	0.361328
-0.2586715421	0.581888105	5921/16384	0.361389
-0.2586810345	0.5819348181	717/1984	0.361391
-0.2611270339	0.5816701321	2961/8192	0.36145
-0.2607425446	0.578193922	5923/16384	0.361511
-0.2591771682	0.5778501189	739/2044	0.361546
-0.2596491089	0.5772390813	1481/4096	0.361572
-0.2600882121	0.5775926804	81/224	0.361607
-0.2602472865	0.5763684721	5925/16384	0.361633
-0.2543819915	0.5785723565	2963/8192	0.361694
-0.253687283	0.5782753201	735/2032	0.361713
-0.2532102963	0.5811014075	5927/16384	0.361755
-0.2527341917	0.5799334626	741/2048	0.361816
-0.2533346038	0.579281043	5929/16384	0.361877
-0.2517582482	0.5788031663	2965/8192	0.361938
-0.2518251803	0.5784450316	139/384	0.361979
-0.2491277004	0.5801348652	5931/16384	0.362
-0.2499183843	0.5923606107	1483/4096	0.362061
-0.2510331233	0.5968848029	5933/16384	0.362122
-0.2676876755	0.5974018771	247/682	0.36217
-0.2671691178	0.6011879328	2967/8192	0.362183
-0.2747227266	0.6108111816	5935/16384	0.362244
-0.2737339662	0.610809389	739/2040	0.362255
-0.2719552403	0.6118012016	371/1024	0.362305
-0.2719552403	0.6118012016	371/1024	0.362305
-0.2687881821	0.6100270717	5937/16384	0.362366
-0.2704188356	0.6161282672	719/1984	0.362399
-0.2717027335	0.6157733433	2969/8192	0.362427
-0.2755659451	0.6151811606	5939/16384	0.362488
-0.2767587221	0.6142812903	741/2044	0.362524
-0.276683985	0.6146877884	1485/4096	0.362549
-0.2767537405	0.6153224825	731/2016	0.362599
-0.2768518708	0.61535908	5941/16384	0.36261
-0.2767963731	0.6154870458	557/1536	0.36263
-0.2836191826	0.6155700335	2971/8192	0.362671
-0.2854375388	0.6158468517	737/2032	0.362697
-0.2913980022	0.6186104979	5943/16384	0.362732
-0.2871898843	0.6188151265	743/2048	0.362793
-0.2859320395	0.6169825863	5945/16384	0.362854
-0.2843784122	0.6196975855	2973/8192	0.362915
-0.282208017	0.6224263157	5947/16384	0.362976
-0.2802029044	0.6228315877	697/1920	0.363021
-0.2804770933	0.6231570749	1487/4096	0.363037
-0.2805115731	0.6220830232	5949/16384	0.363098
-0.2788937373	0.6200728763	743/2046	0.363148
-0.27922548	0.6202009458	2975/8192	0.363159
-0.2808705099	0.6196805877	5951/16384	0.36322
-0.2807916797	0.6199697769	247/680	0.363235
-0.2806127651	0.6203885834	93/256	0.363281
-0.2806127651	0.6203885834	93/256	0.363281
-0.2799977582	0.6203818435	5953/16384	0.363342
-0.2807840769	0.6216011645	2977/8192	0.363403
-0.2808197106	0.6216385954	721/1984	0.363407
-0.282993929	0.6205523922	5955/16384	0.363464
-0.2827611943	0.6192151212	743/2044	0.363503
-0.2830703454	0.6193878223	1489/4096	0.363525
-0.2838312324	0.6193985483	5957/16384	0.363586
-0.2837901241	0.6193451919	733/2016	0.363591
-0.2792819483	0.6160907377	2979/8192	0.363647
-0.278502933	0.6165266879	739/2032	0.363681
-0.2774643582	0.6178726823	5959/16384	0.363708
-0.2774065443	0.6169159786	745/2048	0.36377
-0.2780928395	0.6165678622	5961/16384	0.363831
-0.2767602216	0.6158007967	2981/8192	0.363892
-0.2767963731	0.6154870458	559/1536	0.363932
-0.2742997228	0.6168798013	5963/16384	0.363953
-0.2745731185	0.6227904336	1491/4096	0.364014
-0.274931653	0.6236766364	233/640	0.364063
-0.2750610431	0.6237071101	5965/16384	0.364075
-0.2765120204	0.6253968147	745/2046	0.364125
-0.2762340082	0.6252385027	2983/8192	0.364136
-0.2748877957	0.625345174	5967/16384	0.364197
-0.2750070826	0.6251675486	743/2040	0.364216
-0.2751391149	0.6249331732	373/1024	0.364258
-0.2751391149	0.6249331732	373/1024	0.364258
-0.2755813871	0.6249902717	5969/16384	0.364319
-0.2749699172	0.6241235333	2985/8192	0.36438
-0.2750948345	0.6241532499	653/1792	0.364397
-0.2750055335	0.6239121972	723/1984	0.364415
-0.2739841594	0.6247702108	5971/16384	0.364441
-0.2739614333	0.6252433393	745/2044	0.364481
-0.273883433	0.6251685571	1493/4096	0.364502
-0.2736590086	0.6250933589	5973/16384	0.364563
-0.2736285221	0.6250512466	35/96	0.364583
-0.2733623551	0.6275174981	2987/8192	0.364624
-0.2736110486	0.6287085521	741/2032	0.364665
-0.2776568841	0.6301266815	5975/16384	0.364685
-0.2777655289	0.6375753167	747/2048	0.364746
-0.2762709147	0.6405024018	5977/16384	0.364807
-0.281438964	0.6415557712	2989/8192	0.364868
-0.2920085486	0.6440115842	5979/16384	0.364929
-0.3045178499	0.6445313904	1495/4096	0.36499
-0.2991564999	0.6539420063	5981/16384	0.365051
-0.2941523479	0.6976028236	249/682	0.365103
-0.2933906242	0.6960561456	701/1920	0.365104
-0.2954471856	0.6957463398	2991/8192	0.365112
-0.2817658482	0.6962993799	5983/16384	0.365173
-0.2812181866	0.6922387944	149/408	0.365196
-0.2829555017	0.6916520883	187/512	0.365234
-0.2829555017	0.6916520883	187/512	0.365234
-0.2881664517	0.6919856641	5985/16384	0.365295
-0.2757646224	0.6841790553	2993/8192	0.365356
-0.2695051524	0.6964949727	5987/16384	0.365417
-0.2694620594	0.6988838659	725/1984	0.365423
-0.2734069227	0.7007931057	747/2044	0.36546
-0.2732381936	0.7002493987	1497/4096	0.365479
-0.2728036926	0.6987997748	655/1792	0.365513
-0.2712380901	0.7017085646	5989/16384	0.36554
-0.2732675493	0.7082538667	737/2016	0.365575
-0.2816781783	0.7146476534	2995/8192	0.365601
-0.2894986761	0.7130357336000001	743/2032	0.36565
-0.2909567535	0.7142282525	5991/16384	0.365662
-0.287982799	0.715643923	749/2048	0.365723
-0.2860717182	0.7142420865	5993/16384	0.365784
-0.2861253952	0.7184084452	2997/8192	0.365845
-0.2867607193	0.7250233519	5995/16384	0.365906
-0.2773341495	0.7498466016	1499/4096	0.365967
-0.2804458305	0.7626256522	5997/16384	0.366028
-0.2539683411	0.7885990606	749/2046	0.36608
-0.2577613142	0.7954331941	2999/8192	0.366089
-0.2577817753	0.76783109	703/1920	0.366146
-0.2567900027	0.7678201199	5999/16384	0.36615
-0.2658684271	0.7690332529	249/680	0.366176
-0.2623108695	0.7723951693	375/1024	0.366211
-0.2623108695	0.7723951693	375/1024	0.366211
-0.2595511378	0.7792825991	6001/16384	0.366272
-0.2754441756	0.7680582946	3001/8192	0.366333
-0.263880577	0.7541245234	6003/16384	0.366394
-0.2590063009	0.7564105141	727/1984	0.366431
-0.2595581727	0.7549126455	107/292	0.366438
-0.2599166857	0.7557281954	1501/4096	0.366455
-0.2602569803	0.7536628358	6005/16384	0.366516
-0.2603833644	0.7532497209	563/1536	0.366536
-0.2495333842	0.7492212	739/2016	0.366567
-0.2551238966	0.7405250675	3003/8192	0.366577
-0.2492030216	0.7296450832	745/2032	0.366634
-0.247905042	0.7296290603	6007/16384	0.366638
-0.2515790487	0.7330620348	751/2048	0.366699
-0.2507295973	0.7363447119	6009/16384	0.36676
-0.2558472529	0.7343481681	3005/8192	0.366821
-0.2613063017	0.7337919991	6011/16384	0.366882
-0.2647671352	0.732320204	1503/4096	0.366943
-0.2641015307	0.7344764254	6013/16384	0.367004
-0.2634221444	0.7393478436000001	751/2046	0.367058
-0.263926282	0.739315276	3007/8192	0.367065
-0.2609480725	0.7376538226	6015/16384	0.367126
-0.2620668631	0.7366155045	749/2040	0.367157
-0.262116662	0.7371937594	47/128	0.367188
-0.262116662	0.7371937594	47/128	0.367188
-0.2627334465	0.7380519422	6017/16384	0.367249
-0.2633783188	0.735383595	3009/8192	0.36731
-0.2585928133	0.7329923885	6019/16384	0.367371
-0.257486224	0.7356108638	751/2044	0.367417
-0.2578594462	0.7355544312	1505/4096	0.367432
-0.2577031998	0.735581774	729/1984	0.36744
-0.2567575951	0.7349696648	6021/16384	0.367493
-0.2532267921	0.7485458311	3011/8192	0.367554
-0.2495333842	0.7492212	247/672	0.36756
-0.2630515608	0.7467205046	6023/16384	0.367615
-0.2633217196	0.7464860342	747/2032	0.367618
-0.2612617875	0.7486117365	753/2048	0.367676
-0.2592366205	0.74761139	6025/16384	0.367737
-0.2595740356	0.7473669991	659/1792	0.367746
-0.260632894	0.7523119254	3013/8192	0.367798
-0.2603833644	0.7532497209	565/1536	0.367839
-0.2687074497	0.7588751782	6027/16384	0.367859
-0.2931005083	0.7327407134	1507/4096	0.36792
-0.2842076327	0.7309370839	6029/16384	0.367981
-0.2762220747	0.7249458351	251/682	0.368035
-0.27603122	0.7256607549	3015/8192	0.368042
-0.2805978385	0.722823843	6031/16384	0.368103
-0.2814957601	0.724857804	751/2040	0.368137
-0.2805048099	0.7248623145999999	377/1024	0.368164
-0.2805048099	0.7248623146	377/1024	0.368164
-0.2787168481	0.7251597054	6033/16384	0.368225
-0.2788334116	0.7252290953	707/1920	0.368229
-0.2828028321	0.7284711209	3017/8192	0.368286
-0.2868570312	0.7210134407	6035/16384	0.368347
-0.2844031202	0.7194785728999999	753/2044	0.368395
-0.28453088	0.7198745702	1509/4096	0.368408
-0.2851825287	0.7207899477	731/1984	0.368448
-0.2853967729	0.7189678415	6037/16384	0.368469
-0.2773217225	0.709252246	3019/8192	0.36853
-0.2732675493	0.7082538667	743/2016	0.368552
-0.266305364	0.7183620251	6039/16384	0.368591
-0.2667848359	0.716606563	749/2032	0.368602
-0.2572311372	0.7081506387	755/2048	0.368652
-0.2543817682	0.7084866385	6041/16384	0.368713
-0.2543589845	0.7124311078	3021/8192	0.368774
-0.2509832718	0.7145392977	6043/16384	0.368835
-0.2483958644	0.7157474962	1511/4096	0.368896
-0.2489298226	0.7142729959	6045/16384	0.368958
-0.2490248531	0.7116912037000001	755/2046	0.369013
-0.2488998849	0.7117059478	3023/8192	0.369019
-0.2504278302	0.7121774953	6047/16384	0.36908
-0.249962674	0.7127635988	251/680	0.369118
-0.2499157729	0.7125839435	189/512	0.369141
-0.2499157729	0.7125839435	189/512	0.369141
-0.2495128964	0.7122440591	6049/16384	0.369202
-0.2493995426	0.71369212	3025/8192	0.369263
-0.2494848127	0.7136505576	709/1920	0.369271
-0.2527352294	0.7145572665	6051/16384	0.369324
-0.2526810273	0.7123963177	755/2044	0.369374
-0.2525643663	0.7125100132	1513/4096	0.369385
-0.2534512336	0.7124318484	6053/16384	0.369446
-0.2534049966	0.7125952751	733/1984	0.369456
-0.2509619926	0.7083633613	3027/8192	0.369507
-0.2500693504	0.708923681	745/2016	0.369544
-0.2490283701	0.7092450602	6055/16384	0.369568
-0.2491916384	0.708998206	751/2032	0.369587
-0.249394006	0.7087714338	757/2048	0.369629
-0.2498470151	0.7088747165	6057/16384	0.36969
-0.2494537225	0.7080692996	3029/8192	0.369751
-0.2486215899	0.7070933652	6059/16384	0.369812
-0.2446175829	0.704650345	1515/4096	0.369873
-0.2409763131	0.7063474437	6061/16384	0.369934
-0.2331003301	0.7143790527	757/2046	0.36999
-0.2339234768	0.7148835335	3031/8192	0.369995
-0.2250143699	0.7035259899	6063/16384	0.370056
-0.2306171787	0.6953197469	151/408	0.370098
-0.231262622	0.6956271454	379/1024	0.370117
-0.231262622	0.6956271454	379/1024	0.370117
-0.2323787146	0.6927777377	6065/16384	0.370178
-0.2269598751	0.6920935268	3033/8192	0.370239
-0.2207548079	0.6928639074	6067/16384	0.3703
-0.2204887667	0.6951045969	237/640	0.370312
-0.2191186867	0.6959044039	757/2044	0.370352
-0.2191478536	0.6961342285	1517/4096	0.370361
-0.2183367285	0.6949031297	6069/16384	0.370422
-0.2182470779	0.6945505492	569/1536	0.370443
-0.2145743763	0.6959396565	735/1984	0.370464
-0.211586704	0.6912327958	3035/8192	0.370483
-0.1958916991	0.6853115124	6071/16384	0.370544
-0.2048463779	0.6839462557	753/2032	0.370571
-0.2028271414	0.6860987353	759/2048	0.370605
-0.2040312483	0.6896181161	6073/16384	0.370667
-0.2080328349	0.685377977	3037/8192	0.370728
-0.2120436726	0.6841694053	6075/16384	0.370789
-0.2152429462	0.6823892097	1519/4096	0.37085
-0.2147276185	0.6838885768	6077/16384	0.370911
-0.2153498128	0.6866188183	23/62	0.370968
-0.2154058935	0.686724501	3039/8192	0.370972
-0.2133282507	0.6865844039	6079/16384	0.371033
-0.2140193557	0.6859005942	757/2040	0.371078
-0.2138656702	0.6859594849	95/256	0.371094
-0.2138656702	0.6859594849	95/256	0.371094
-0.2144292199	0.6862221743	6081/16384	0.371155
-0.2141974679	0.6846186127	3041/8192	0.371216
-0.2110896107	0.6826789938	6083/16384	0.371277
-0.2104543242	0.6859093289	759/2044	0.371331
-0.2105286386	0.6860782857	1521/4096	0.371338
-0.2107471578	0.6862192676	713/1920	0.371354
-0.2093290866	0.6859003203	6085/16384	0.371399
-0.2107286906	0.6956360353	3043/8192	0.37146
-0.2145743763	0.6959396565	737/1984	0.371472
-0.2169429782	0.6904858072	6087/16384	0.371521
-0.216617205	0.6905612085	107/288	0.371528
-0.2174541953	0.6919187931	755/2032	0.371555
-0.2168352669	0.6919328585	761/2048	0.371582
-0.2156358556	0.69223231	6089/16384	0.371643
-0.2180009232	0.6938606441	3045/8192	0.371704
-0.2182470779	0.6945505492	571/1536	0.371745
-0.2224356998	0.693696854	6091/16384	0.371765
-0.224651426	0.6866417979	1523/4096	0.371826
-0.2225710223	0.6842978342	6093/16384	0.371887
-0.2217658873	0.6818730589000001	761/2046	0.371945
-0.2217550361	0.6817969787	3047/8192	0.371948
-0.2233163496	0.6821935411	6095/16384	0.372009
-0.2228528475	0.6825771796	253/680	0.372059
-0.222920595	0.6825598533	381/1024	0.37207
-0.222920595	0.6825598533	381/1024	0.37207
-0.2225130575	0.682336783	6097/16384	0.372131
-0.2227951974	0.6835615074	3049/8192	0.372192
-0.2226481964	0.6834644437	667/1792	0.37221
-0.224509558	0.6835426944	6099/16384	0.372253
-0.2245006308	0.682636963	761/2044	0.372309
-0.2244942862	0.6826119363	1525/4096	0.372314
-0.2247964604	0.6827073372	6101/16384	0.372375
-0.2248635474	0.6827580793	143/384	0.372396
-0.2262356269	0.6813900696	3051/8192	0.372437
-0.2254929344	0.6786118413	739/1984	0.37248
-0.2226758281	0.6759746148	6103/16384	0.372498
-0.2246450276	0.6728365777999999	751/2016	0.37252
-0.2284833678	0.6734455371	757/2032	0.372539
-0.2294848494	0.6766306255	763/2048	0.372559
-0.2317547167	0.6737076912	6105/16384	0.37262
-0.2304725372	0.6698280768	3053/8192	0.372681
-0.2322545142	0.6667004777	6107/16384	0.372742
-0.2355335135	0.6614736909	1527/4096	0.372803
-0.2359555403	0.6643229717	6109/16384	0.372864
-0.2375806568	0.6684254898999999	763/2046	0.372923
-0.2375049159	0.6684173838	3055/8192	0.372925
-0.2351392525	0.6683759023	6111/16384	0.372986
-0.2356259424	0.6676267688	761/2040	0.373039
-0.2355885573	0.667531028	191/512	0.373047
-0.2355885573	0.667531028	191/512	0.373047
-0.236370006	0.6677400429	6113/16384	0.373108
-0.2354993738	0.6656048749	3057/8192	0.373169
-0.2314581581	0.6653165584	6115/16384	0.37323
-0.2325170976	0.6689718602	109/292	0.373288
-0.2324856574	0.6690337566	1529/4096	0.373291
-0.2324344927	0.6684889661	669/1792	0.373326
-0.2315521639	0.6695150776	6117/16384	0.373352
-0.2343996587	0.672729549	3059/8192	0.373413
-0.2360652947	0.6722146196	239/640	0.373437
-0.2374087583	0.6718644692	6119/16384	0.373474
-0.2372399322	0.6721225709	741/1984	0.373488
-0.2370132096	0.6725333100999999	251/672	0.373512
-0.236857815	0.6724213911	759/2032	0.373524
-0.2369311808	0.6723930766	765/2048	0.373535
-0.2364363532	0.6722612062	6121/16384	0.373596
-0.2367733959	0.6731649487	3061/8192	0.373657
-0.2372168865	0.6739751125	6123/16384	0.373718
-0.2394995072	0.6757786568	1531/4096	0.373779
-0.2426602181	0.677780012	6125/16384	0.37384
-0.2458204923	0.6820257922	255/682	0.3739
-0.2458330162	0.6819142633	3063/8192	0.373901
-0.2421641989	0.681386509	6127/16384	0.373962
-0.2428858141	0.6806645779	763/2040	0.37402
-0.2429383335	0.6806693539999999	383/1024	0.374023
-0.2429383335	0.680669354	383/1024	0.374023
-0.2438673505	0.6810453129	6129/16384	0.374084
-0.2427739305	0.6788705467	3065/8192	0.374146
-0.240822749	0.679293376	6131/16384	0.374207
-0.2404319247	0.6804754688	765/2044	0.374266
-0.2404359091	0.6804680623	1533/4096	0.374268
-0.2401060743	0.6802840275	6133/16384	0.374329
-0.2400484658	0.6802151949	575/1536	0.374349
-0.2385417473	0.6812916634	3067/8192	0.37439
-0.2352126572	0.6830095774	6135/16384	0.374451
-0.2358634069	0.6815987825000001	719/1920	0.374479
-0.2361924139	0.6818813247	743/1984	0.374496
-0.2360395349	0.6820751987	755/2016	0.374504
-0.2359709175	0.6819645029	761/2032	0.374508
-0.2360184432	0.6819702111	767/2048	0.374512
-0.2367789357	0.6821098744	6137/16384	0.374573
-0.2363728507	0.6809371505	3069/8192	0.374634
-0.2361860562	0.6799828717	6139/16384	0.374695
-0.2361443728	0.6788327521	1535/4096	0.374756
-0.2365847214	0.6790936855	6141/16384	0.374817
-0.2375791922	0.6792157191	3071/8192	0.374878
-0.2375802264	0.6792153759	767/2046	0.374878
-0.2372369449	0.6798243867	6143/16384	0.374939
-0.2371249669	0.6795787953	3/8	0.375
-0.2371249669	0.6795787953	3/8	0.375
-0.2372869303	0.6794357424	6145/16384	0.375061
-0.2367457041	0.6793170579	3073/8192	0.375122
-0.2362696454	0.6799482985	6147/16384	0.375183
-0.2367634849	0.6804975186	1537/4096	0.375244
-0.2367624166	0.6804988138	767/2044	0.375245
-0.2365952018	0.6807457192	6149/16384	0.375305
-0.2382475103	0.6812744784	3075/8192	0.375366
-0.2389600768	0.6795019595	6151/16384	0.375427
-0.2392729852	0.6798593221	769/2048	0.375488
-0.2392555693	0.6798600239	763/2032	0.375492
-0.2392830855	0.6798956116	757/2016	0.375496
-0.2393435379	0.67981716	745/1984	0.375504
-0.23915402	0.6797460008	721/1920	0.375521
-0.2390853749	0.6801891499	6153/16384	0.375549
-0.2390524522	0.6801340107	673/1792	0.375558
-0.2399038725	0.6800893672	3077/8192	0.37561
-0.2400484658	0.6802151949	577/1536	0.375651
-0.2407031761	0.6795266288	6155/16384	0.375671
-0.2403734247	0.6761505771	1539/4096	0.375732
-0.2376770934	0.6755123362	6157/16384	0.375793
-0.2359387139	0.675915574	3079/8192	0.375854
-0.2359427604	0.6759272348000001	769/2046	0.375855
-0.2361461322	0.6747651996	6159/16384	0.375916
-0.2364483304	0.67507893	385/1024	0.375977
-0.2364483304	0.67507893	385/1024	0.375977
-0.2364316972	0.6750814211	767/2040	0.37598
-0.2362792165	0.6753962048	6161/16384	0.376038
-0.2372166612	0.675237538	3081/8192	0.376099
-0.2374839054	0.673962043	6163/16384	0.37616
-0.2365007165	0.6736907021	1541/4096	0.376221
-0.2365013531	0.6737024492	769/2044	0.376223
-0.2366087041	0.6733858719	6165/16384	0.376282
-0.2349517086	0.6721937907	3083/8192	0.376343
-0.232758343	0.6769706901	6167/16384	0.376404
-0.2277431853	0.674709153	771/2048	0.376465
-0.2284833678	0.6734455371	765/2032	0.376476
-0.2246450276	0.6728365777999999	253/672	0.376488
-0.2254929344	0.6786118413	747/1984	0.376512
-0.2264957692	0.6785471265	6169/16384	0.376526
-0.2284949417	0.6799505	241/640	0.376563
-0.2288616009	0.6801009668	3085/8192	0.376587
-0.2294006159	0.681796295	6171/16384	0.376648
-0.2301582274	0.6833951392	1543/4096	0.376709
-0.2293645787	0.6831639071	6173/16384	0.37677
-0.2278565462	0.6833076132	3087/8192	0.376831
-0.2278819469	0.683300763	257/682	0.376833
-0.228117507	0.6823416266	6175/16384	0.376892
-0.2283743826	0.6826407222999999	193/512	0.376953
-0.2283743826	0.6826407223	193/512	0.376953
-0.2283824221	0.6826704128	769/2040	0.376961
-0.2281994203	0.6828985232	6177/16384	0.377014
-0.2290247954	0.6828821084	3089/8192	0.377075
-0.2297488942	0.6815662462	6179/16384	0.377136
-0.2284666286	0.6811152374	1545/4096	0.377197
-0.2284911609	0.6811091634000001	771/2044	0.377202
-0.2285835903	0.6806036682	6181/16384	0.377258
-0.2255573291	0.6810520399	3091/8192	0.377319
-0.2260602918	0.6832617062	6183/16384	0.37738
-0.2256632943	0.6829455246	773/2048	0.377441
-0.2255826886	0.6830086542	767/2032	0.377461
-0.2258460507	0.6830852267999999	761/2016	0.37748
-0.2257731247	0.6825749706	6185/16384	0.377502
-0.2258433037	0.6824711939	749/1984	0.37752
-0.2250210175	0.6828453412	3093/8192	0.377563
-0.2248635474	0.6827580793	145/384	0.377604
-0.2241157309	0.6833922406	6187/16384	0.377625
-0.222522639	0.6870906491	1547/4096	0.377686
-0.2262160306	0.6901887876	6189/16384	0.377747
-0.2330261827	0.6896257036	3095/8192	0.377808
-0.2330418872	0.6897666697	773/2046	0.37781
-0.2361246884	0.6964188705	6191/16384	0.377869
-0.2321310302	0.704392519	387/1024	0.37793
-0.2321310302	0.704392519	387/1024	0.37793
-0.2334353015	0.7043313161	257/680	0.377941
-0.2317736437	0.7089246668	6193/16384	0.377991
-0.2388277885	0.7056962525	3097/8192	0.378052
-0.2417790491	0.7007945607	6195/16384	0.378113
-0.2412086839	0.6988406574	1549/4096	0.378174
-0.2413090965	0.6988106795	773/2044	0.37818
-0.2420254429	0.6990102249	6197/16384	0.378235
-0.2421900958	0.6990976853999999	581/1536	0.378255
-0.2458626905	0.6963781061	3099/8192	0.378296
-0.2503345743	0.6918148993	6199/16384	0.378357
-0.2493059727	0.6942825163	775/2048	0.378418
-0.2494696134	0.6936059726	769/2032	0.378445
-0.2480654696	0.6944009168	109/288	0.378472
-0.247779057	0.6943300152	6201/16384	0.378479
-0.2491682849	0.6963547729	751/1984	0.378528
-0.2490111735	0.696408579	3101/8192	0.37854
-0.2494362809	0.6986502557	6203/16384	0.378601
-0.2494818672	0.7004354323	727/1920	0.378646
-0.2498075693	0.7003593334	1551/4096	0.378662
-0.2489926023	0.6999523628	6205/16384	0.378723
-0.2471901049	0.6998916034	3103/8192	0.378784
-0.2471754343	0.6998225338	25/66	0.378788
-0.247699686	0.6987185262	6207/16384	0.378845
-0.2479386723	0.6991560219	97/256	0.378906
-0.2479386723	0.6991560219	97/256	0.378906
-0.2480241249	0.6991356436	773/2040	0.378922
-0.2476518775	0.6994341615	6209/16384	0.378967
-0.2486661805	0.699601647	3105/8192	0.379028
-0.2496105631	0.6978544484	6211/16384	0.379089
-0.2484473774	0.6973498666	1553/4096	0.37915
-0.2484223254	0.6972903907	775/2044	0.379159
-0.2486885789	0.6968357951	6213/16384	0.379211
-0.244222431	0.6963880539	3107/8192	0.379272
-0.2446291276	0.699846552	6215/16384	0.379333
-0.2438925872	0.699332285	777/2048	0.379395
-0.2441247064	0.6995575241999999	771/2032	0.379429
-0.244111653	0.6986169873	6217/16384	0.379456
-0.2442006353	0.6987111195	85/224	0.379464
-0.242558776	0.6992351613	3109/8192	0.379517
-0.2426824985	0.699012736	753/1984	0.379536
-0.2421900958	0.6990976853999999	583/1536	0.379557
-0.2408938333	0.7018748733	6219/16384	0.379578
-0.2461185297	0.7070630588	1555/4096	0.379639
-0.2479140339	0.7059579312000001	243/640	0.379688
-0.2479496525	0.7057161971	6221/16384	0.3797
-0.2502159906	0.7049451713	3111/8192	0.379761
-0.250264098	0.7050471798	259/682	0.379765
-0.2499239765	0.7063852672	6223/16384	0.379822
-0.2495738028	0.7060126968	389/1024	0.379883
-0.2495738028	0.7060126968	389/1024	0.379883
-0.2494664273	0.7060696474	155/408	0.379902
-0.2498023026	0.70562536	6225/16384	0.379944
-0.2486033985	0.7058774268	3113/8192	0.380005
-0.2487004054	0.705733278	681/1792	0.380022
-0.2488986691	0.7076317346	6227/16384	0.380066
-0.2496018443	0.7075487205	1557/4096	0.380127
-0.2496277307	0.7075958322	111/292	0.380137
-0.2495431312	0.7078475102	6229/16384	0.380188
-0.2518878801	0.7095097483	3115/8192	0.380249
-0.2550811479	0.7043758118	6231/16384	0.38031
-0.2655356871	0.7111932674	779/2048	0.380371
-0.2667848359	0.716606563	773/2032	0.380413
-0.2709183503	0.711305729	6233/16384	0.380432
-0.2732675493	0.7082538667	767/2016	0.380456
-0.2694039836	0.7026288815	3117/8192	0.380493
-0.2694620594	0.6988838659	755/1984	0.380544
-0.2699121209	0.6913594291	6235/16384	0.380554
-0.264952502	0.6830380145	1559/4096	0.380615
-0.2716491384	0.6818596141	6237/16384	0.380676
-0.2758182509	0.6569514179	731/1920	0.380729
-0.2750211083	0.6578050308	3119/8192	0.380737
-0.2742430989	0.6571417022	779/2046	0.380743
-0.2808451474	0.651567644	6239/16384	0.380798
-0.28302404	0.6546041607	195/512	0.380859
-0.28302404	0.6546041607	195/512	0.380859
-0.2825554236	0.6529350685999999	259/680	0.380882
-0.2800468243	0.6572063035	6241/16384	0.38092
-0.2933321002	0.6548364812	3121/8192	0.380981
-0.284966819	0.6439935531	6243/16384	0.381042
-0.2815630843	0.644672706	1561/4096	0.381104
-0.2811859798	0.6451562612	779/2044	0.381115
-0.2826701172	0.6447704946	683/1792	0.381138
-0.2812688821	0.6429235581	6245/16384	0.381165
-0.2727627382	0.6467735141	3123/8192	0.381226
-0.270134302	0.6499502865	6247/16384	0.381287
-0.2703448331	0.6484676726	781/2048	0.381348
-0.2713326514	0.648349416	775/2032	0.381398
-0.2713111145	0.6480578586	6249/16384	0.381409
-0.2700253103	0.6470919184	769/2016	0.381448
-0.269786633	0.6470593174	3125/8192	0.38147
-0.2673726178	0.6466003181	6251/16384	0.381531
-0.2658068146	0.6472941236	757/1984	0.381552
-0.2588430378	0.6466960817	1563/4096	0.381592
-0.2552079598	0.6462184473	6253/16384	0.381653
-0.2470483407	0.6441375022	3127/8192	0.381714
-0.2463749357	0.6446542942	71/186	0.38172
-0.2526111383	0.6409365092	733/1920	0.381771
-0.2524584964	0.6406869815	6255/16384	0.381775
-0.2521729886	0.6425877262	391/1024	0.381836
-0.2521729886	0.6425877262	391/1024	0.381836
-0.2519937448	0.641924699	779/2040	0.381863
-0.2504987583	0.643235467	6257/16384	0.381897
-0.2542825508	0.6448182698	3129/8192	0.381958
-0.2560575255	0.6416348744	6259/16384	0.382019
-0.2559356379	0.6403342327	1565/4096	0.38208
-0.2557370274	0.6402807156	781/2044	0.382094
-0.2565920537	0.6403525599	6261/16384	0.382141
-0.2567166198	0.6404320385	587/1536	0.382161
-0.2579671824	0.6355370931	3131/8192	0.382202
-0.2608620963	0.6307248809	6263/16384	0.382263
-0.2607080616	0.6331425749	783/2048	0.382324
-0.2594336975	0.6339252217	777/2032	0.382382
-0.259437356	0.6337999483	6265/16384	0.382385
-0.2612759964	0.6351216077	257/672	0.38244
-0.2612433194	0.6350635488	3133/8192	0.382446
-0.2632379894	0.6364574245	6267/16384	0.382507
-0.264025649	0.6377864202	759/1984	0.38256
-0.2641903263	0.6378884632	1567/4096	0.382568
-0.2632125303	0.6380186955	6269/16384	0.382629
-0.26153125	0.6391840114	3135/8192	0.38269
-0.261471986	0.6393778382	261/682	0.382698
-0.2611971181	0.6377654842	6271/16384	0.382751
-0.261745792	0.6379901313	49/128	0.382812
-0.261745792	0.6379901313	49/128	0.382812
-0.2615129845	0.6379290435	781/2040	0.382843
-0.2617199949	0.6384808099	6273/16384	0.382874
-0.262732645	0.6378308948	3137/8192	0.382935
-0.2619816538	0.6361791574	6275/16384	0.382996
-0.2610299565	0.6360899673	1569/4096	0.383057
-0.260979751	0.6362558692	783/2044	0.383072
-0.2610295413	0.635518128	6277/16384	0.383118
-0.2579896421	0.6382160532	3139/8192	0.383179
-0.2590835617	0.6404478144	6279/16384	0.38324
-0.25820411	0.6402568949	785/2048	0.383301
-0.2580919844	0.639567129	6281/16384	0.383362
-0.2580598104	0.6396136724	779/2032	0.383366
-0.2581966525	0.6396043717	687/1792	0.383371
-0.2570224342	0.6405351929	3141/8192	0.383423
-0.2571103355	0.6405958861	773/2016	0.383433
-0.2567166198	0.6404320385	589/1536	0.383464
-0.256904183	0.6429773065	6283/16384	0.383484
-0.2641110267	0.6458161939	1571/4096	0.383545
-0.2658068146	0.6472941236	761/1984	0.383569
-0.2660434233	0.6445956399	6285/16384	0.383606
-0.2680310181	0.6419422513	3143/8192	0.383667
-0.2680649804	0.6416074753	785/2046	0.383675
-0.2691487327	0.6439702772	6287/16384	0.383728
-0.268265238	0.6438404994	393/1024	0.383789
-0.268265238	0.6438404994	393/1024	0.383789
-0.2686091913	0.6439037791	261/680	0.383824
-0.2680980795	0.6430923015	6289/16384	0.38385
-0.2680742358	0.6431478691	737/1920	0.383854
-0.2669038682	0.6445624032	3145/8192	0.383911
-0.2687385882	0.6463003345	6291/16384	0.383972
-0.2697695487	0.6460531643	1573/4096	0.384033
-0.269836393	0.6458924409	785/2044	0.384051
-0.2698758458	0.6466221856	6293/16384	0.384094
-0.2750457236	0.6437129172	3147/8192	0.384155
-0.2715399468	0.6363976516	6295/16384	0.384216
-0.2729500879	0.6307091834	787/2048	0.384277
-0.2734310601	0.6290067379	6297/16384	0.384338
-0.2736110486	0.6287085521	781/2032	0.38435
-0.2712406972	0.6289241962	3149/8192	0.384399
-0.2712774365	0.62865235	775/2016	0.384425
-0.2688112608	0.6278466539	6299/16384	0.38446
-0.2677224917	0.6263088673	1575/4096	0.384521
-0.2687934418	0.6261108828	763/1984	0.384577
-0.268832507	0.6261875824	6301/16384	0.384583
-0.2706034703	0.6251713106	3151/8192	0.384644
-0.2707343054	0.6249522264	787/2046	0.384653
-0.270828329	0.6264485373	6303/16384	0.384705
-0.2703152969	0.6262477814	197/512	0.384766
-0.2703152969	0.6262477814	197/512	0.384766
-0.2705941459	0.6263420914	157/408	0.384804
-0.27035124	0.6257744762	6305/16384	0.384827
-0.2693204736	0.6264102723	3153/8192	0.384888
-0.2693950858	0.6264469875999999	739/1920	0.384896
-0.270300983	0.6280285708	6307/16384	0.384949
-0.2711813265	0.6279276154	1577/4096	0.38501
-0.2712191159	0.6277321556	787/2044	0.385029
-0.2713164041	0.6284473392	6309/16384	0.385071
-0.2729975277	0.6259027907	3155/8192	0.385132
-0.272553124	0.6246963961	6311/16384	0.385193
-0.2729829481	0.6249379801	789/2048	0.385254
-0.2729683493	0.6252944857	6313/16384	0.385315
-0.2729271667	0.625404025	783/2032	0.385335
-0.2735350495	0.6249743623	3157/8192	0.385376
-0.2736285221	0.6250512466	37/96	0.385417
-0.2740144795	0.6240388391	6315/16384	0.385437
-0.2726000101	0.6191757224	1579/4096	0.385498
-0.2713508657	0.6171392569	6317/16384	0.385559
-0.2704188356	0.6161282672	765/1984	0.385585
-0.2596022428	0.6168861797	3159/8192	0.38562
-0.2603589489	0.6191259987	263/682	0.38563
-0.2463046724	0.6097867504	6319/16384	0.385681
-0.2501130485	0.6065311794	395/1024	0.385742
-0.2501130485	0.6065311794	395/1024	0.385742
-0.2488928063	0.6097413259	787/2040	0.385784
-0.2551012646	0.6079790151	6321/16384	0.385803
-0.249763997	0.5994903273	3161/8192	0.385864
-0.2418676986	0.6013769303	6323/16384	0.385925
-0.2405921518	0.6021294651	247/640	0.385937
-0.2385395329	0.6031259107	1581/4096	0.385986
-0.2394961925	0.6041781361	789/2044	0.386008
-0.2374874664	0.6009457005	6325/16384	0.386047
-0.2377029135	0.6003763153	593/1536	0.386068
-0.2241736041	0.6206662818	3163/8192	0.386108
-0.2259330838	0.6406184121	6327/16384	0.386169
-0.2198588772	0.6357011279	791/2048	0.38623
-0.2211218145	0.6308492649	6329/16384	0.386292
-0.2164781726	0.6311642926	785/2032	0.386319
-0.2127188523	0.6329727693	3165/8192	0.386353
-0.2069332417	0.6384708799	779/2016	0.386409
-0.2061873365	0.6367211285	6331/16384	0.386414
-0.2006746269	0.6361177719	1583/4096	0.386475
-0.2015581475	0.6337352677	6333/16384	0.386536
-0.2000819011	0.6293118967	767/1984	0.386593
-0.1999348785	0.6291598689	3167/8192	0.386597
-0.1995822621	0.6297499291999999	791/2046	0.386608
-0.2036721775	0.6287704893	6335/16384	0.386658
-0.2028771103	0.6301291342999999	99/256	0.386719
-0.2028771103	0.6301291343	99/256	0.386719
-0.2022128978	0.6295478309	263/680	0.386765
-0.2017654314	0.6299472301	6337/16384	0.38678
-0.2026729681	0.6325508897	3169/8192	0.386841
-0.2067225279	0.6323836938	6339/16384	0.386902
-0.2091759321	0.629797647	1585/4096	0.386963
-0.2087309517	0.629495692	743/1920	0.386979
-0.2084071226	0.6301604086	113/292	0.386986
-0.2113300396	0.6308493957	6341/16384	0.387024
-0.2026594654	0.6190715499	3171/8192	0.387085
-0.1959966795	0.6233400668	6343/16384	0.387146
-0.1954325459	0.6208436302	793/2048	0.387207
-0.1971123274	0.6195855316	6345/16384	0.387268
-0.1941813512	0.6168707342	787/2032	0.387303
-0.1925681449	0.6181386948	3173/8192	0.387329
-0.1921368486	0.6167027742	595/1536	0.38737
-0.1886913887	0.6224219613	6347/16384	0.38739
-0.1847739717	0.6230862142	781/2016	0.387401
-0.1900892554	0.6309909893	1587/4096	0.387451
-0.1896618304	0.633650879	6349/16384	0.387512
-0.1908840547	0.6373314059	3175/8192	0.387573
-0.1911757786	0.6368552138	793/2046	0.387586
-0.189995952	0.6370028547	769/1984	0.387601
-0.1884271499	0.63695658	6351/16384	0.387634
-0.1889710863	0.6362912143	397/1024	0.387695
-0.1889710863	0.6362912143	397/1024	0.387695
-0.1894453335	0.6365976811	791/2040	0.387745
-0.1896312964	0.6364846345	6353/16384	0.387756
-0.1890115516	0.6347879743	3177/8192	0.387817
-0.1892287855	0.6349166162	695/1792	0.387835
-0.1871208689	0.6353825554	6355/16384	0.387878
-0.1863683501	0.636335983	1589/4096	0.387939
-0.1865564656	0.6361009126	793/2044	0.387965
-0.1857692318	0.6361207976	6357/16384	0.388
-0.185627889	0.6359564492999999	149/384	0.388021
-0.1854219609	0.6396430513	3179/8192	0.388062
-0.1905942551	0.6459061247	6359/16384	0.388123
-0.1859439274	0.6488100531	795/2048	0.388184
-0.1810443697	0.6469227748	6361/16384	0.388245
-0.1830876651	0.6530637398	789/2032	0.388287
-0.1822797956	0.6535503395	3181/8192	0.388306
-0.1825009555	0.6593498496	6363/16384	0.388367
-0.1766980515	0.6644503735	1591/4096	0.388428
-0.1757310158	0.6607960623	6365/16384	0.388489
-0.173314545	0.656179574	3183/8192	0.38855
-0.173310129	0.6567862481	265/682	0.388563
-0.1760067804	0.6558887744	771/1984	0.388609
-0.1760604902	0.6558441219	6367/16384	0.388611
-0.175735837	0.656858583	199/512	0.388672
-0.175735837	0.656858583	199/512	0.388672
-0.1750497435	0.6569649166	793/2040	0.388725
-0.1749216568	0.6568218606	6369/16384	0.388733
-0.1761385632	0.6588642451	3185/8192	0.388794
-0.1788625675	0.6573569137	6371/16384	0.388855
-0.1791918067	0.6547582993	1593/4096	0.388916
-0.1794238758	0.6552646444	795/2044	0.388943
-0.1792810596	0.6553997841	697/1792	0.388951
-0.1804447664	0.654044356	6373/16384	0.388977
-0.1758963866	0.6518073576	3187/8192	0.389038
-0.1747910154	0.6511612074999999	249/640	0.389062
-0.1728698676	0.6517469417	6375/16384	0.389099
-0.1734197125	0.6509207381	797/2048	0.38916
-0.174085507	0.6510232609	6377/16384	0.389221
-0.1734277065	0.6497974465	791/2032	0.389272
-0.1735133723	0.6497320616	3189/8192	0.389282
-0.1720948967	0.6491704721	6379/16384	0.389343
-0.1668732366	0.650173887	785/2016	0.389385
-0.1678855327	0.6487764195	1595/4096	0.389404
-0.1662144041	0.6464391501	6381/16384	0.389465
-0.1625237184	0.6424951784	3191/8192	0.389526
-0.1627647696	0.6436010331000001	797/2046	0.389541
-0.1661998104	0.6422742659	6383/16384	0.389587
-0.1660295162	0.6433902385	773/1984	0.389617
-0.1656641468	0.6431808629	399/1024	0.389648
-0.1656641468	0.6431808629	399/1024	0.389648
-0.1647384526	0.643204785	53/136	0.389706
-0.1648286724	0.6431409083	6385/16384	0.389709
-0.1661211338	0.644832753	3193/8192	0.389771
-0.1677031478	0.6437753327	6387/16384	0.389832
-0.1683441242	0.6428581783	1597/4096	0.389893
-0.1682464216	0.6431436354	797/2044	0.389922
-0.1688388044	0.6430106879	6389/16384	0.389954
-0.1689695355	0.6431289686	599/1536	0.389974
-0.1696714535	0.6407263206	3195/8192	0.390015
-0.1725149026	0.6388314559	6391/16384	0.390076
-0.1723896017	0.6404315624	749/1920	0.390104
-0.1720919622	0.6401456326	799/2048	0.390137
-0.1713657166	0.640263232	6393/16384	0.390198
-0.1720666247	0.6413181159	793/2032	0.390256
-0.1720839904	0.641313237	3197/8192	0.390259
-0.1729242622	0.6420310251	6395/16384	0.39032
-0.1730464855	0.6431097044	787/2016	0.390377
-0.1730122278	0.6431322989	1599/4096	0.390381
-0.1725046632	0.6430399122	6397/16384	0.390442
-0.1716541669	0.6433029178	3199/8192	0.390503
-0.1717928535	0.6433280954	799/2046	0.390518
-0.171677148	0.6427106	6399/16384	0.390564
-0.1718643247	0.6428335777999999	25/64	0.390625
-0.1718643247	0.6428335778	25/64	0.390625
-0.1718265585	0.6429916066	6401/16384	0.390686
-0.1718270019	0.6429915629	797/2040	0.390686
-0.1722373311	0.6428595555	3201/8192	0.390747
-0.1721583622	0.6423158319	6403/16384	0.390808
-0.1717802568	0.6419833561	1601/4096	0.390869
-0.1719226705	0.6420333078	799/2044	0.3909
-0.1718413293	0.6416671343	6405/16384	0.39093
-0.1705984939	0.6423613024	3203/8192	0.390991
-0.1703862639	0.6435342571	6407/16384	0.391052
-0.1699750885	0.6433201468	801/2048	0.391113
-0.1701072609	0.6433598262	751/1920	0.391146
-0.170036206	0.6429851581	6409/16384	0.391174
-0.1700761324	0.6430242108000001	701/1792	0.391183
-0.1692412138	0.6432879981	3205/8192	0.391235
-0.1692174733	0.6433058806	795/2032	0.39124
-0.1689695355	0.6431289686	601/1536	0.391276
-0.1691379048	0.6444623364	6411/16384	0.391296
-0.1712064258	0.6459055334	1603/4096	0.391357
-0.1712579307	0.6456844466	263/672	0.391369
-0.1722894775	0.6465822923	6413/16384	0.391418
-0.1740408835	0.6459671362	3207/8192	0.391479
-0.1737674515	0.6459642831	267/682	0.391496
-0.1741210151	0.6472509805	6415/16384	0.391541
-0.1737031077	0.6470055971000001	401/1024	0.391602
-0.1737031077	0.6470055971	401/1024	0.391602
-0.1738514174	0.647056225	777/1984	0.391633
-0.1737639375	0.6466613449	6417/16384	0.391663
-0.1737476783	0.6466801301	47/120	0.391667
-0.1728948543	0.6469907975	3209/8192	0.391724
-0.1731615218	0.6481366688	6419/16384	0.391785
-0.1739274838	0.648713156	1605/4096	0.391846
-0.1736884013	0.6486540025	801/2044	0.391879
-0.1738226311	0.6492316489	6421/16384	0.391907
-0.1766599457	0.6485496766	3211/8192	0.391968
-0.1769718723	0.6437963584	6423/16384	0.392029
-0.1792692939	0.6429476002	803/2048	0.39209
-0.1828644944	0.6436615202	6425/16384	0.392151
-0.1806099401	0.6404774811	251/640	0.392188
-0.1801188619	0.6401415867	3213/8192	0.392212
-0.1802737529	0.6403321867	797/2032	0.392224
-0.1783852904	0.63865119	6427/16384	0.392273
-0.177882398	0.6366053106	1607/4096	0.392334
-0.1780419627	0.6371132787	113/288	0.392361
-0.1789498985	0.6365958262	6429/16384	0.392395
-0.1807079857	0.6357724095	3215/8192	0.392456
-0.1804062171	0.635693256	73/186	0.392473
-0.1808045426	0.6370679242	6431/16384	0.392517
-0.1803637524	0.6368474978999999	201/512	0.392578
-0.1803637524	0.6368474979	201/512	0.392578
-0.1804003496	0.6364842135	6433/16384	0.392639
-0.1803915177	0.6364747495999999	779/1984	0.392641
-0.180457887	0.6365164508	267/680	0.392647
-0.1795479981	0.6369022421	3217/8192	0.3927
-0.1798702811	0.6380543168	6435/16384	0.392761
-0.1807479219	0.6386675884	1609/4096	0.392822
-0.1804657984	0.6385532476	11/28	0.392857
-0.1806558699	0.6393737498	6437/16384	0.392883
-0.1832012108	0.6374578982	3219/8192	0.392944
-0.1833477342	0.6351729535	6439/16384	0.393005
-0.1841038983	0.6355914439	805/2048	0.393066
-0.1840129284	0.6361956934	6441/16384	0.393127
-0.1852916933	0.6357013366	3221/8192	0.393188
-0.1851340101	0.6358901449	799/2032	0.393209
-0.185627889	0.6359564492999999	151/384	0.393229
-0.1858979929	0.6338902844	6443/16384	0.39325
-0.1821932362	0.6289957031	1611/4096	0.393311
-0.1847739717	0.6230862142	793/2016	0.393353
-0.1788405425	0.6250719437	6445/16384	0.393372
-0.1718047566	0.6314970546	3223/8192	0.393433
-0.1728126213	0.6307848348	805/2046	0.393451
-0.1676922029	0.6287602095	6447/16384	0.393494
-0.1692589102	0.6278022598	403/1024	0.393555
-0.1692589102	0.6278022598	403/1024	0.393555
-0.1704346303	0.6287298287	6449/16384	0.393616
-0.1704003034	0.6290953744	803/2040	0.393627
-0.1718853467	0.6270199012	781/1984	0.393649
-0.1702118525	0.6237793074	3225/8192	0.393677
-0.1659661696	0.6253465905	6451/16384	0.393738
-0.1644287186	0.6266361921	1613/4096	0.393799
-0.164884439	0.6261164694	115/292	0.393836
-0.1635841738	0.6261536206	6453/16384	0.39386
-0.1633962329	0.625851453	605/1536	0.39388
-0.1617003785	0.6299915105	3227/8192	0.393921
-0.1567947121	0.6331979593	6455/16384	0.393982
-0.1574668391	0.6306811197	807/2048	0.394043
-0.1587612314	0.6304802977	6457/16384	0.394104
-0.1575817282	0.6284906916	3229/8192	0.394165
-0.1577703254	0.6281169572	801/2032	0.394193
-0.1560403923	0.627027133	6459/16384	0.394226
-0.1565659572	0.6248259486	757/1920	0.394271
-0.1562749863	0.6249838096	1615/4096	0.394287
-0.1571996168	0.6252834307	265/672	0.394345
-0.1571664897	0.6252868987	6461/16384	0.394348
-0.1586833557	0.6249790778	3231/8192	0.394409
-0.1583633497	0.6248827156	269/682	0.394428
-0.1585761322	0.625994623	6463/16384	0.39447
-0.1582599009	0.6257701381	101/256	0.394531
-0.1582599009	0.6257701381	101/256	0.394531
-0.1583238264	0.6255041051	6465/16384	0.394592
-0.1583842797	0.6254117986	161/408	0.394608
-0.1576242214	0.6257017418	3233/8192	0.394653
-0.1576095535	0.6257174091	783/1984	0.394657
-0.157743588	0.6266206304	6467/16384	0.394714
-0.1583164323	0.6272574891	1617/4096	0.394775
-0.1579936711	0.6270937028	807/2044	0.394814
-0.1581596426	0.6278322397	6469/16384	0.394836
-0.1603611954	0.6266743833	3235/8192	0.394897
-0.1609063885	0.6247613105	6471/16384	0.394958
-0.1616069092	0.6252019995	809/2048	0.39502
-0.1614554671	0.6257793477	6473/16384	0.395081
-0.1629432664	0.6254209007	3237/8192	0.395142
-0.1632293192	0.6257108519	803/2032	0.395177
-0.1633962329	0.625851453	607/1536	0.395182
-0.1632641547	0.6230825843	6475/16384	0.395203
-0.159698537	0.6209430907	1619/4096	0.395264
-0.1588918051	0.6196832259	253/640	0.395313
-0.1585169392	0.619804484	6477/16384	0.395325
-0.1584259692	0.6195230512	797/2016	0.395337
-0.1558237305	0.6198340306	3239/8192	0.395386
-0.1564206854	0.6200961841	809/2046	0.395406
-0.1564291461	0.6179882891	6479/16384	0.395447
-0.1568732831	0.6185358405	405/1024	0.395508
-0.1568732831	0.6185358405	405/1024	0.395508
-0.1566601385	0.6189804448	6481/16384	0.395569
-0.156460466	0.6191541342	269/680	0.395588
-0.1579304629	0.6188935987	3241/8192	0.39563
-0.1577904527	0.6190069635	709/1792	0.395647
-0.1581940985	0.6192001657	785/1984	0.395665
-0.1580277752	0.6173802361	6483/16384	0.395691
-0.157606725	0.6162904399	1621/4096	0.395752
-0.1578939041	0.6167352534	809/2044	0.395793
-0.1581224436	0.6157803051	6485/16384	0.395813
-0.1541045559	0.6144590789	3243/8192	0.395874
-0.1492126049	0.6212846894	6487/16384	0.395935
-0.1439166789	0.619881246	811/2048	0.395996
-0.1441032299	0.6146520782	6489/16384	0.396057
-0.1334208719	0.6252618341	3245/8192	0.396118
-0.1315512741	0.631358567	805/2032	0.396161
-0.1404616882	0.6346085575	6491/16384	0.396179
-0.1439574202	0.6436374147	1623/4096	0.39624
-0.1391753299	0.6457654125	6493/16384	0.396301
-0.1393631899	0.651907017	799/2016	0.396329
-0.1313631037	0.653319521	761/1920	0.396354
-0.1321877769	0.6537886176	3247/8192	0.396362
-0.1338631786	0.6521429231	811/2046	0.396383
-0.1285959281	0.6473062298	6495/16384	0.396423
-0.1312870195	0.6474504304000001	203/512	0.396484
-0.1312870195	0.6474504304	203/512	0.396484
-0.1317774164	0.6491375558	6497/16384	0.396545
-0.132899063	0.6496353349	809/2040	0.396569
-0.1350943525	0.6457216426	3249/8192	0.396606
-0.131927246	0.6409004953	6499/16384	0.396667
-0.1328015028	0.6411805513	787/1984	0.396673
-0.1259260886	0.6373176814	1625/4096	0.396729
-0.1278686514	0.6377546879	711/1792	0.396763
-0.12971976	0.6368723377	811/2044	0.396771
-0.1259834378	0.6314348919	6501/16384	0.39679
-0.1134807475	0.6515516066	3251/8192	0.396851
-0.1217715187	0.6656444014	6503/16384	0.396912
-0.1172361198	0.6678980489	813/2048	0.396973
-0.1145291214	0.665325112	6505/16384	0.397034
-0.1143090252	0.6746762766	3253/8192	0.397095
-0.1183405132	0.6783736484	807/2032	0.397146
-0.121444866	0.6778210189	6507/16384	0.397156
-0.1363328496	0.681067602	1627/4096	0.397217
-0.1431159709	0.6903623243	6509/16384	0.397278
-0.1631213417	0.6961866172	3255/8192	0.397339
-0.1597965928	0.6962474684	271/682	0.397361
-0.1509700134	0.7060164454	763/1920	0.397396
-0.1514181485	0.7065313114	6511/16384	0.3974
-0.1515760042	0.701912576	407/1024	0.397461
-0.1515760042	0.701912576	407/1024	0.397461
-0.154873806	0.7007176363	6513/16384	0.397522
-0.1525817999	0.6984775765	811/2040	0.397549
-0.1469948117	0.6961485012	3257/8192	0.397583
-0.1420405599	0.7027228472	6515/16384	0.397644
-0.1419204695	0.7097553384	789/1984	0.397681
-0.1408250672	0.7092819005	1629/4096	0.397705
-0.1393128482	0.7085655212	813/2044	0.39775
-0.1383117744	0.7100228305	6517/16384	0.397766
-0.137435057	0.7101859294	611/1536	0.397786
-0.1392545594	0.7209215746	3259/8192	0.397827
-0.1231445011	0.7364655459	6519/16384	0.397888
-0.1241190181	0.7286864745	815/2048	0.397949
-0.1283677742	0.7277594281	6521/16384	0.39801
-0.122792862	0.72219072	3261/8192	0.398071
-0.1180617607	0.7194798325	809/2032	0.39813
-0.1181988276	0.7199081077	6523/16384	0.398132
-0.1173089191	0.7131372807	1631/4096	0.398193
-0.1199145876	0.7133829293	6525/16384	0.398254
-0.123898295	0.7121318856	803/2016	0.398313
-0.1239087372	0.7121957981	3263/8192	0.398315
-0.1233112807	0.7127050377	815/2046	0.398338
-0.123639117	0.714853934	6527/16384	0.398376
-0.1229343644	0.714262241	51/128	0.398438
-0.1229343644	0.714262241	51/128	0.398438
-0.123233699	0.7137096508	6529/16384	0.398499
-0.1224376436	0.7134476791	271/680	0.398529
-0.1214198522	0.7138799702	3265/8192	0.39856
-0.1212802069	0.7159674766	6531/16384	0.398621
-0.1229543021	0.71821318	1633/4096	0.398682
-0.1230231041	0.7183032032	791/1984	0.39869
-0.1221465299	0.7189888805	815/2044	0.398728
-0.1228489148	0.7198257148	6533/16384	0.398743
-0.1282297544	0.7171717203	3267/8192	0.398804
-0.1300430584	0.710746026	6535/16384	0.398865
-0.1322049927	0.7114666918	817/2048	0.398926
-0.1319841242	0.7132251013	6537/16384	0.398987
-0.1317635708	0.7130030491	715/1792	0.398996
-0.1358516131	0.7105173117	3269/8192	0.399048
-0.137435057	0.7101859294	613/1536	0.399089
-0.1346039272	0.7060537224	6539/16384	0.399109
-0.1344835914	0.7068644647	811/2032	0.399114
-0.1264415242	0.7004285074	1635/4096	0.39917
-0.121481466	0.6952668754	6541/16384	0.399231
-0.1112711202	0.6981504937	3271/8192	0.399292
-0.1124760455	0.6982107634	115/288	0.399306
-0.1128147296	0.6967044431	817/2046	0.399316
-0.1109894919	0.6912476253	6543/16384	0.399353
-0.113057765	0.6925457017	409/1024	0.399414
-0.113057765	0.6925457017	409/1024	0.399414
-0.1125259175	0.6940454735	6545/16384	0.399475
-0.1126076981	0.6939877596	767/1920	0.399479
-0.1143340873	0.6948312606	163/408	0.39951
-0.1171630775	0.6931414861	3273/8192	0.399536
-0.1165341116	0.6872710544	6547/16384	0.399597
-0.1120656007	0.6826847834	1637/4096	0.399658
-0.1139993613	0.6837429263	793/1984	0.399698
-0.1145098521	0.681519272	817/2044	0.399706
-0.112515479	0.6791624055	6549/16384	0.399719
-0.0973903851	0.6850882304	3275/8192	0.39978
-0.0952006142	0.7108574521	6551/16384	0.399841
-0.082294415	0.7138398029	819/2048	0.399902
-0.080029429	0.7031930255	6553/16384	0.399963
-0.0676028621	0.7385965947	3277/8192	0.400024
-0.0876375574	0.7442435037	6555/16384	0.400085
-0.0909427766	0.7503463174	813/2032	0.400098
-0.0978540314	0.7583974032	1639/4096	0.400146
-0.0931726361	0.7619928519	6557/16384	0.400208
-0.0893915902	0.7702272027	3279/8192	0.400269
-0.0886259693	0.76830723	273/682	0.400293
-0.0879619762	0.7684081495	269/672	0.400298
-0.0849037972	0.7661932081	6559/16384	0.40033
-0.0870161225	0.7658325656	205/512	0.400391
-0.0870161225	0.7658325656	205/512	0.400391
-0.0873527193	0.7671994108	6561/16384	0.400452
-0.0899910449	0.7657234388	817/2040	0.40049
-0.0902078904	0.7640823699	3281/8192	0.400513
-0.0899853009	0.7640207861	769/1920	0.400521
-0.0872374227	0.7601914887	6563/16384	0.400574
-0.0785429491	0.757765597	1641/4096	0.400635
-0.0780727472	0.7514855099	117/292	0.400685
-0.0743624215	0.7521862779	6565/16384	0.400696
-0.0762072078	0.7521057039	795/1984	0.400706
-0.0746407764	0.7755675194	3283/8192	0.400757
-0.087535736	0.7816240205	6567/16384	0.400818
-0.0863025577	0.7845028923	821/2048	0.400879
-0.0837279346	0.7840068409	6569/16384	0.40094
-0.0878388687	0.7884790818	3285/8192	0.401001
-0.0912968235	0.7873200301	6571/16384	0.401062
-0.0953779538	0.7870061441	815/2032	0.401083
-0.100324538	0.7847706561	1643/4096	0.401123
-0.1096705683	0.7911824331	6573/16384	0.401184
-0.1297091947	0.7751980677	3287/8192	0.401245
-0.1308657094	0.7811529925	821/2046	0.401271
-0.1393302498	0.7845082343000001	809/2016	0.40129
-0.1360950102	0.7956428995	6575/16384	0.401306
-0.1301924454	0.7917496173	411/1024	0.401367
-0.1301924454	0.7917496173	411/1024	0.401367
-0.1320142753	0.787011795	6577/16384	0.401428
-0.1223118582	0.7890959975	273/680	0.401471
-0.1192619029	0.7908022426	3289/8192	0.401489
-0.1198172803	0.8030715552	6579/16384	0.40155
-0.1131703686	0.8034555598999999	257/640	0.401562
-0.1379682501	0.8236331493	1645/4096	0.401611
-0.1424545039	0.8265381623	821/2044	0.401663
-0.1431774864	0.8269668245	6581/16384	0.401672
-0.1444123221	0.8274765902	617/1536	0.401693
-0.1518669793	0.8218994402000001	797/1984	0.401714
-0.1601526422	0.8204318495	3291/8192	0.401733
-0.1966601212	0.8542790052	6583/16384	0.401794
-0.179259788	0.8521144956	823/2048	0.401855
-0.1771439937	0.8420237515	6585/16384	0.401917
-0.1664695262	0.8538091791	3293/8192	0.401978
-0.1618148757	0.8596513787	6587/16384	0.402039
-0.1476407761	0.8579948544	817/2032	0.402067
-0.1502605226	0.8566051857	1647/4096	0.4021
-0.1515676269	0.8536177113	6589/16384	0.402161
-0.1520376439	0.8479281203	3295/8192	0.402222
-0.1532315478	0.8485561123000001	823/2046	0.402248
-0.155675824	0.8498449572	811/2016	0.402282
-0.1556362466	0.8498697508	6591/16384	0.402283
-0.1542748527	0.8503048918	103/256	0.402344
-0.1542748527	0.8503048918	103/256	0.402344
-0.153849238	0.8492804797	6593/16384	0.402405
-0.1529125211	0.8519775978	821/2040	0.402451
-0.1523777828	0.8520650487	3297/8192	0.402466
-0.1546994922	0.8539896281	6595/16384	0.402527
-0.1607218231	0.8533230379	1649/4096	0.402588
-0.1605235106	0.8527989785	773/1920	0.402604
-0.1630606464	0.8536170645	823/2044	0.402642
-0.1634684327	0.8540488134	6597/16384	0.402649
-0.1623559225	0.8442176574	3299/8192	0.40271
-0.161958646	0.845600843	799/1984	0.402722
-0.1500437741	0.8382257799	6599/16384	0.402771
-0.1506165964	0.8344259247	825/2048	0.402832
-0.1544775074	0.8344975309	6601/16384	0.402893
-0.146550849	0.8288328528	3301/8192	0.402954
-0.1444123221	0.8274765902	619/1536	0.402995
-0.1419012285	0.8334795765	6603/16384	0.403015
-0.1414536276	0.8440156468	819/2032	0.403051
-0.1384744692	0.8448136834	1651/4096	0.403076
-0.1322236088	0.8513318635	6605/16384	0.403137
-0.1363339599	0.857848054	3303/8192	0.403198
-0.1350934758	0.8575824696	25/62	0.403226
-0.133182757	0.8575348249	6607/16384	0.403259
-0.1333727283	0.8571394761	271/672	0.403274
-0.1337769515	0.8567758848	413/1024	0.40332
-0.1337769515	0.8567758848	413/1024	0.40332
-0.1344371784	0.8572953295	6609/16384	0.403381
-0.133821688	0.8546465789	823/2040	0.403431
-0.1340397198	0.854334958	3305/8192	0.403442
-0.1344789989	0.8547077734	723/1792	0.40346
-0.1314341796	0.8555486251	6611/16384	0.403503
-0.1305952264	0.8578735042	1653/4096	0.403564
-0.1300712425	0.8582505772	825/2044	0.40362
-0.1300209203	0.858246174	6613/16384	0.403625
-0.1299106997	0.8583936076000001	155/384	0.403646
-0.1310057179	0.860470213	3307/8192	0.403687
-0.1307519129	0.864020516	801/1984	0.40373
-0.1355762701	0.8689570178	6615/16384	0.403748
-0.1298314148	0.8698102455	827/2048	0.403809
-0.1299722117	0.8659671068	6617/16384	0.40387
-0.1162417366	0.8690172695	3309/8192	0.403931
-0.1176619574	0.8796333809	6619/16384	0.403992
-0.1024988185	0.8816556027	821/2032	0.404035
-0.1036577963	0.8835738155	1655/4096	0.404053
-0.103826881	0.8789279823	6621/16384	0.404114
-0.103851246	0.8731362656	3311/8192	0.404175
-0.1049282887	0.8738044683	827/2046	0.404203
-0.1067964714	0.8743990971	6623/16384	0.404236
-0.1058474765	0.8754411636	815/2016	0.404266
-0.1058194924	0.8749627466	207/512	0.404297
-0.1058194924	0.8749627466	207/512	0.404297
-0.1054205341	0.8741802983	6625/16384	0.404358
-0.1042394541	0.8770856244	55/136	0.404412
-0.1042406642	0.8768114766	3313/8192	0.404419
-0.1070828118	0.8780856085	6627/16384	0.40448
-0.1120719581	0.8751378531	1657/4096	0.404541
-0.1113287549	0.8763761902	725/1792	0.404576
-0.1147115087	0.8735144704	827/2044	0.404599
-0.1148024885	0.8737239801	6629/16384	0.404602
-0.108979991	0.8697108287	3315/8192	0.404663
-0.1104373636	0.8680122922	259/640	0.404687
-0.1043899794	0.8677364666	6631/16384	0.404724
-0.1045915466	0.8672733331	803/1984	0.404738
-0.1050022126	0.8668379646	829/2048	0.404785
-0.1059102641	0.8671839675	6633/16384	0.404846
-0.1048442143	0.8655037205	3317/8192	0.404907
-0.103778206	0.8654668027	6635/16384	0.404968
-0.10017378	0.8636071158	823/2032	0.40502
-0.1001624475	0.864105903	1659/4096	0.405029
-0.1026150877	0.8592483538	6637/16384	0.40509
-0.0977420607	0.8508693846	3319/8192	0.405151
-0.09986417190000001	0.8519219236	829/2046	0.405181
-0.1024521674	0.8529381446	6639/16384	0.405212
-0.1010929958	0.8534086774	817/2016	0.405258
-0.1013067677	0.8534689826	415/1024	0.405273
-0.1013067677	0.8534689826	415/1024	0.405273
-0.1007631817	0.8524868807	6641/16384	0.405334
-0.1000752081	0.8561478809	827/2040	0.405392
-0.1001945708	0.8560821962	3321/8192	0.405396
-0.1030043726	0.8556980475	6643/16384	0.405457
-0.1048335845	0.8545819109	1661/4096	0.405518
-0.1053910432	0.8547698216	829/2044	0.405577
-0.105391951	0.8547630734	6645/16384	0.405579
-0.1055491105	0.8547599343	623/1536	0.405599
-0.1068132872	0.8532042154	3323/8192	0.40564
-0.1120541981	0.8547996647	6647/16384	0.405701
-0.1104406023	0.8559998487	779/1920	0.405729
-0.1103090572	0.8555022466	805/1984	0.405746
-0.1105030838	0.8555533009	831/2048	0.405762
-0.1097683592	0.8546941986	6649/16384	0.405823
-0.1094941911	0.8566073658	3325/8192	0.405884
-0.1096521964	0.8575377072	6651/16384	0.405945
-0.1082084217	0.8584795305	825/2032	0.406004
-0.1082215851	0.8584799985	1663/4096	0.406006
-0.1079992288	0.8579535327	6653/16384	0.406067
-0.1075167289	0.8571962655	3327/8192	0.406128
-0.1077454575	0.8571978269	277/682	0.406158
-0.108100226	0.8571419597	6655/16384	0.406189
-0.1079873887	0.8572977247	13/32	0.40625
-0.1079873887	0.8572977247	13/32	0.40625
-0.1078649589	0.857212452	6657/16384	0.406311
-0.1079141092	0.8576645263	3329/8192	0.406372
-0.1079144551	0.8576651561	829/2040	0.406373
-0.1083576572	0.8576470679	6659/16384	0.406433
-0.1089078122	0.8570958277	1665/4096	0.406494
-0.10923775	0.8569308743	6661/16384	0.406555
-0.1092359324	0.8569312784999999	831/2044	0.406556
-0.1084127384	0.8560877903	3331/8192	0.406616
-0.1066565798	0.8559413642	6663/16384	0.406677
-0.1065830386	0.8554017594	833/2048	0.406738
-0.1065203292	0.855365196	807/1984	0.406754
-0.1065616154	0.8555665317	781/1920	0.406771
-0.1071044472	0.8552956397	6665/16384	0.406799
-0.1070414921	0.8553970588000001	729/1792	0.406808
-0.1058595882	0.8548203877	3333/8192	0.40686
-0.1055491105	0.8547599343	625/1536	0.406901
-0.1054074575	0.8555160866	6667/16384	0.406921
-0.1048220718	0.8575572086	1667/4096	0.406982
-0.104752759	0.8575550036	827/2032	0.406988
-0.1016948277	0.859860226	6669/16384	0.407043
-0.1062003203	0.8616450029	3335/8192	0.407104
-0.1057374363	0.8620406802	833/2046	0.407136
-0.1052101091	0.8628352921	6671/16384	0.407166
-0.1050676897	0.862324929	417/1024	0.407227
-0.1050676897	0.862324929	417/1024	0.407227
-0.1050099968	0.8622859829	821/2016	0.407242
-0.1054815877	0.8622341439	6673/16384	0.407288
-0.1043259599	0.8612541771	3337/8192	0.407349
-0.1042991591	0.8612179404	277/680	0.407353
-0.1035183759	0.8628663696	6675/16384	0.40741
-0.1044977699	0.8644751815	1669/4096	0.407471
-0.1045845604	0.8650484377	6677/16384	0.407532
-0.1045962601	0.8650604562	119/292	0.407534
-0.1064105695	0.8647922341	3339/8192	0.407593
-0.1102265677	0.8625707859	6679/16384	0.407654
-0.1115110021	0.8643585425	835/2048	0.407715
-0.1107149223	0.8639131787	809/1984	0.407762
-0.1097819433	0.8651845986	6681/16384	0.407776
-0.1104373636	0.8680122922	261/640	0.407813
-0.1201448291	0.8678463299	3341/8192	0.407837
-0.1174212248	0.8617085705	6683/16384	0.407898
-0.1200465343	0.8573454938	1671/4096	0.407959
-0.1198849578	0.8570136566	829/2032	0.407972
-0.1213923519	0.8581125602	6685/16384	0.40802
-0.1238299825	0.8587279932	3343/8192	0.408081
-0.1234284807	0.8591983326	835/2046	0.408113
-0.1228010923	0.8601025546	6687/16384	0.408142
-0.1226929171	0.8595116279	209/512	0.408203
-0.1226929171	0.8595116279	209/512	0.408203
-0.122650606	0.8596951946	823/2016	0.408234
-0.1231397101	0.8594145128	6689/16384	0.408264
-0.1220864481	0.8585759325	3345/8192	0.408325
-0.122069568	0.8586513106	49/120	0.408333
-0.1211090849	0.8594744227	6691/16384	0.408386
-0.1208074704	0.8622806222	1673/4096	0.408447
-0.1199419382	0.8638975694	6693/16384	0.408508
-0.1200566519	0.8638998567	835/2044	0.408513
-0.1252718697	0.8628025726	3347/8192	0.408569
-0.1273897768	0.8588347335	6695/16384	0.40863
-0.1283236446	0.8592106948	837/2048	0.408691
-0.1281552985	0.860169498	6697/16384	0.408752
-0.1280138358	0.8606727367	811/1984	0.40877
-0.1296300113	0.8586701314	3349/8192	0.408813
-0.1299106997	0.8583936076000001	157/384	0.408854
-0.129252986	0.8575768834	6699/16384	0.408875
-0.1278480656	0.8541866319	1675/4096	0.408936
-0.1272239411	0.8546883852	831/2032	0.408957
-0.1303256949	0.8477766157	6701/16384	0.408997
-0.118449861	0.8464462135	3351/8192	0.409058
-0.1191331614	0.8439620494	9/22	0.409091
-0.1201221357	0.8385136268	6703/16384	0.409119
-0.1217550554	0.8411376982	419/1024	0.40918
-0.1217550554	0.8411376982	419/1024	0.40918
-0.1205754225	0.8407451757	275/672	0.409226
-0.1199347865	0.8423770297	6705/16384	0.409241
-0.1258114266	0.8448164242	3353/8192	0.409302
-0.1254512969	0.8443461199	167/408	0.409314
-0.1298624951	0.8389237122	6707/16384	0.409363
-0.1188608634	0.8216568643	1677/4096	0.409424
-0.1139457976	0.820858188	6709/16384	0.409485
-0.1143563671	0.8205138442	837/2044	0.409491
-0.1128441291	0.8210534009	629/1536	0.409505
-0.107807047	0.8295458397	3355/8192	0.409546
-0.0917311647	0.8322331636	6711/16384	0.409607
-0.0939457596	0.8275156665	839/2048	0.409668
-0.0972231974	0.8284549778	6713/16384	0.409729
-0.0942792844	0.8228858501	813/1984	0.409778
-0.0945931163	0.8226757822	3357/8192	0.40979
-0.0920232001	0.8203586654	6715/16384	0.409851
-0.0941880598	0.8144996933999999	787/1920	0.409896
-0.0935630124	0.8146523121	1679/4096	0.409912
-0.09289372429999999	0.8160570571	833/2032	0.409941
-0.0954774045	0.8155334696	6717/16384	0.409973
-0.0987640836	0.8162863307	3359/8192	0.410034
-0.0980910451	0.8167767996	839/2046	0.410068
-0.0973263225	0.8179436258	6719/16384	0.410095
-0.0972105895	0.8172496225	105/256	0.410156
-0.0972105895	0.8172496225	105/256	0.410156
-0.0977199589	0.8171389142	6721/16384	0.410217
-0.0977213643	0.8171446986000001	827/2016	0.410218
-0.0964675353	0.8161673944	3361/8192	0.410278
-0.0967510957	0.816128426	279/680	0.410294
-0.0953979187	0.8173441423	6723/16384	0.410339
-0.0952885461	0.8199213153	1681/4096	0.4104
-0.0947052263	0.8210880243	6725/16384	0.410461
-0.09453797059999999	0.8209606972	839/2044	0.41047
-0.0989329856	0.8216390068	3363/8192	0.410522
-0.1046944076	0.8180368319	6727/16384	0.410583
-0.1062980206	0.8199247484	841/2048	0.410645
-0.1046302115	0.8213763001	6729/16384	0.410706
-0.1108503841	0.8211254361	3365/8192	0.410767
-0.1100208358	0.8221381412	815/1984	0.410786
-0.1128441291	0.8210534009	631/1536	0.410807
-0.1114241911	0.8159147049	6731/16384	0.410828
-0.105078248	0.8068671897	1683/4096	0.410889
-0.1081334774	0.8094592995	835/2032	0.410925
-0.1131703686	0.8034555598999999	263/640	0.410938
-0.101123976	0.7988643052	6733/16384	0.41095
-0.0911719198	0.8019040741	3367/8192	0.411011
-0.0917679612	0.8001632809	841/2046	0.411046
-0.0910281491	0.7970191671	6735/16384	0.411072
-0.0924100172	0.7978769695	421/1024	0.411133
-0.0924100172	0.7978769695	421/1024	0.411133
-0.0917855905	0.7989023182	6737/16384	0.411194
-0.0916058459	0.7993268505	829/2016	0.41121
-0.0958947802	0.7985251698	3369/8192	0.411255
-0.0953275874	0.7989684701	737/1792	0.411272
-0.0950369828	0.7993392975	839/2040	0.411275
-0.0946865737	0.7937897273	6739/16384	0.411316
-0.0901765229	0.7916437864	1685/4096	0.411377
-0.0892305183	0.7900067422	6741/16384	0.411438
-0.0897421959	0.7898879406	841/2044	0.411448
-0.0838898132	0.7940195269	3371/8192	0.411499
-0.0783562095	0.8084103966	6743/16384	0.41156
-0.0699523512	0.8065566287	843/2048	0.411621
-0.0730286466	0.800117031	6745/16384	0.411682
-0.046952852	0.8149379792	3373/8192	0.411743
-0.0556040116	0.8269998448	817/1984	0.411794
-0.0617846965	0.8302943445	6747/16384	0.411804
-0.069151672	0.8501055586	1687/4096	0.411865
-0.06446513869999999	0.8490579785	837/2032	0.411909
-0.0626568762	0.8544002562	6749/16384	0.411926
-0.0529612895	0.8632353395	791/1920	0.411979
-0.0537686361	0.8638282768	3375/8192	0.411987
-0.0529484261	0.8600990342	281/682	0.412023
-0.0505330838	0.8556490231	6751/16384	0.412048
-0.0532198229	0.8567031305	211/512	0.412109
-0.0532198229	0.8567031305	211/512	0.412109
-0.0523686137	0.8586204632	6753/16384	0.41217
-0.0549297209	0.8588502114	277/672	0.412202
-0.0586035211	0.856805763	3377/8192	0.412231
-0.0596690346	0.8577290108	841/2040	0.412255
-0.0572689464	0.8504894199	6755/16384	0.412292
-0.0486500479	0.840861885	1689/4096	0.412354
-0.0514666716	0.8428473456	739/1792	0.412388
-0.0472763273	0.8316337365	6757/16384	0.412415
-0.049552284	0.8301626929	843/2044	0.412427
-0.0306310499	0.8592178983	3379/8192	0.412476
-0.0431748082	0.8815063569	6759/16384	0.412537
-0.0386564103	0.8863869714	845/2048	0.412598
-0.0336649281	0.881427327	6761/16384	0.412659
-0.0418068532	0.8978533865	3381/8192	0.41272
-0.0485129675	0.8934961136	6763/16384	0.412781
-0.0541375376	0.8922864108	819/1984	0.412802
-0.0626160247	0.8914624178	1691/4096	0.412842
-0.0647729065	0.8983635485	839/2032	0.412894
-0.0664012352	0.9001633426	6765/16384	0.412903
-0.0827322991	0.9068744191	3383/8192	0.412964
-0.0794081425	0.9087849607	845/2046	0.413001
-0.0762058701	0.9104564922	793/1920	0.413021
-0.0763469634	0.9106557841	6767/16384	0.413025
-0.0766119094	0.9088255309	423/1024	0.413086
-0.0766119094	0.9088255309	423/1024	0.413086
-0.0783176058	0.9091503426	6769/16384	0.413147
-0.0747026542	0.9058171449	119/288	0.413194
-0.0740900328	0.9045316011	3385/8192	0.413208
-0.07215194730000001	0.9031736204	281/680	0.413235
-0.0721888619	0.9093688625	6771/16384	0.413269
-0.0725748735	0.9129018823	1693/4096	0.41333
-0.0720864467	0.9136470212	6773/16384	0.413391
-0.0720624831	0.9138182885	845/2044	0.413405
-0.0720712605	0.9138732667	635/1536	0.413411
-0.0735380465	0.9161555754	3387/8192	0.413452
-0.0695800069	0.9219785858	6775/16384	0.413513
-0.068893701	0.9200011233	847/2048	0.413574
-0.0703185484	0.9192503408	6777/16384	0.413635
-0.0676211412	0.9184626054	3389/8192	0.413696
-0.0662987881	0.9186242383	6779/16384	0.413757
-0.0653066948	0.9161790529	821/1984	0.41381
-0.0652311577	0.9160808795	1695/4096	0.413818
-0.06615589669999999	0.9158770289	841/2032	0.413878
-0.0661542472	0.9158681566	6781/16384	0.413879
-0.067484747	0.9155158753	3391/8192	0.41394
-0.0673649852	0.9159070553000001	77/186	0.413978
-0.0672625336	0.9163621752	6783/16384	0.414001
-0.06711360800000001	0.9161297011	53/128	0.414062
-0.067113608	0.9161297011	53/128	0.414062
-0.0673112033	0.9160217991	6785/16384	0.414124
-0.0666279037	0.9158034881	3393/8192	0.414185
-0.0666330939	0.9157984568	835/2016	0.414187
-0.0663888868	0.9157540567	169/408	0.414216
-0.0664423744	0.9164586838	6787/16384	0.414246
-0.0669654288	0.9175749137	1697/4096	0.414307
-0.0671456276	0.9181192868	6789/16384	0.414368
-0.0672632817	0.9182112853	121/292	0.414384
-0.068558302	0.9172749155	3395/8192	0.414429
-0.0698501343	0.9149228244	6791/16384	0.41449
-0.0706807069	0.915111748	849/2048	0.414551
-0.0704686101	0.9160040114	6793/16384	0.414612
-0.0703570411	0.9158006208	743/1792	0.414621
-0.0719117636	0.9143143879	3397/8192	0.414673
-0.0720712605	0.9138732667	637/1536	0.414714
-0.071112101	0.9133857509	6795/16384	0.414734
-0.0685361973	0.9111144943	1699/4096	0.414795
-0.0686629865	0.9116995297	823/1984	0.414819
-0.0681225003	0.907266985	6797/16384	0.414856
-0.0682946894	0.9079510607	843/2032	0.414862
-0.0591067179	0.9106430436	3399/8192	0.414917
-0.0580265816	0.9088192759	283/682	0.414956
-0.0561354785	0.9067154059	6799/16384	0.414978
-0.0579171129	0.9068184256	425/1024	0.415039
-0.0579171129	0.9068184256	425/1024	0.415039
-0.0576641741	0.9081704444	6801/16384	0.4151
-0.0577450358	0.9081193893	797/1920	0.415104
-0.0620428511	0.9062854997	3401/8192	0.415161
-0.0613937562	0.906979858	93/224	0.415179
-0.0641295834	0.9063079956	847/2040	0.415196
-0.0587293455	0.901283299	6803/16384	0.415222
-0.050283434	0.9004916592	1701/4096	0.415283
-0.0466904696	0.8986863079	6805/16384	0.415344
-0.0456667896	0.8981922162	849/2044	0.415362
-0.0474940798	0.9126870793	3403/8192	0.415405
-0.0581446921	0.9205690309	6807/16384	0.415466
-0.0566243277	0.9241017586	851/2048	0.415527
-0.0531532415	0.9223748028	6809/16384	0.415588
-0.0577688413	0.9306441851	3405/8192	0.415649
-0.0628523546	0.928805885	6811/16384	0.41571
-0.0676913424	0.9302231185	1703/4096	0.415771
-0.0675308887	0.9313760978	825/1984	0.415827
-0.0674661987	0.9314243469	6813/16384	0.415833
-0.06747922739999999	0.9315987419	845/2032	0.415846
-0.0676044786	0.9330865099	3407/8192	0.415894
-0.06713045989999999	0.9329495668	851/2046	0.415934
-0.0665301898	0.9327968793	6815/16384	0.415955
-0.0668681079	0.9326013861	213/512	0.416016
-0.0668681079	0.9326013861	213/512	0.416016
-0.0669990041	0.9328787445	6817/16384	0.416077
-0.067398168	0.9320242571	3409/8192	0.416138
-0.06734135970000001	0.932021145	799/1920	0.416146
-0.06750329720000001	0.9317527329	839/2016	0.416171
-0.0675096934	0.9316679922	283/680	0.416176
-0.0665708931	0.9315528935	6819/16384	0.416199
-0.064120972	0.9320813192	1705/4096	0.41626
-0.061778241	0.9322312868	6821/16384	0.416321
-0.0602140389	0.9326440697	851/2044	0.416341
-0.0659108408	0.9350880053	3411/8192	0.416382
-0.0684894866	0.935038482	6823/16384	0.416443
-0.0685828576	0.9355529134	853/2048	0.416504
-0.0680336546	0.9357384952	6825/16384	0.416565
-0.069194385	0.9359238429	3413/8192	0.416626
-0.0694682453	0.9354772402	6827/16384	0.416687
-0.0707220975	0.9343274117	1707/4096	0.416748
-0.0722615025	0.9350738477	6829/16384	0.416809
-0.0734553914	0.9351042406	847/2032	0.416831
-0.0733283862	0.9340272599	827/1984	0.416835
-0.0761500735	0.9293471637	3415/8192	0.41687
-0.0780714606	0.9306066074	853/2046	0.416911
-0.0800484504	0.9326921239	6831/16384	0.416931
-0.0784063581	0.9325842999	427/1024	0.416992
-0.0784063581	0.9325842999	427/1024	0.416992
-0.0784721743	0.93122393	6833/16384	0.417053
-0.0754184371	0.9338274141	3417/8192	0.417114
-0.0742309157	0.9356212382	851/2040	0.417157
-0.0750045085	0.9358657229	841/2016	0.417163
-0.0778283336	0.9363613848	6835/16384	0.417175
-0.07711654060000001	0.9374622594000001	267/640	0.417187
-0.0825523205	0.9390287378	1709/4096	0.417236
-0.0833251625	0.9420511773	6837/16384	0.417297
-0.0837764677	0.9431619068	641/1536	0.417318
-0.0840465634	0.9431292999999999	853/2044	0.417319
-0.0914515867	0.9330486897	3419/8192	0.417358
-0.1086150386	0.9171359	6839/16384	0.417419
-0.111052238	0.9254727445	855/2048	0.41748
-0.1051440579	0.9276521118	6841/16384	0.417542
-0.1146101427	0.9332030674	3421/8192	0.417603
-0.1201911153	0.935009515	6843/16384	0.417664
-0.118177283	0.9473063623	1711/4096	0.417725
-0.1148991112	0.9458947957	6845/16384	0.417786
-0.1129763055	0.9469070731	849/2032	0.417815
-0.1099545999	0.9444016144	829/1984	0.417843
-0.1097867091	0.944326677	3423/8192	0.417847
-0.1107770017	0.9431317858	285/682	0.417889
-0.1121950246	0.9417775233	6847/16384	0.417908
-0.112243936	0.9429487705	107/256	0.417969
-0.112243936	0.9429487705	107/256	0.417969
-0.1112560325	0.9429543647	6849/16384	0.41803
-0.1133522562	0.9451577894	3425/8192	0.418091
-0.1144870165	0.9451393521	853/2040	0.418137
-0.1154459502	0.9432649133	6851/16384	0.418152
-0.1154360827	0.9430890199999999	281/672	0.418155
-0.1155698161	0.9376002501	1713/4096	0.418213
-0.1151051226	0.9377347552999999	803/1920	0.418229
-0.1157557473	0.9351886923	6853/16384	0.418274
-0.1151791784	0.9349273261	855/2044	0.418297
-0.1089126026	0.9361644232	3427/8192	0.418335
-0.1007936748	0.9431645721	6855/16384	0.418396
-0.0979858504	0.9414269462	857/2048	0.418457
-0.0999087132	0.9382813789	6857/16384	0.418518
-0.0913122941	0.9429351304	3429/8192	0.418579
-0.08976693920000001	0.9458803782	643/1536	0.41862
-0.0947765593	0.9479547751	6859/16384	0.41864
-0.1018594335	0.9556539299	1715/4096	0.418701
-0.1003360524	0.9623654746	6861/16384	0.418762
-0.1095632962	0.966372564	851/2032	0.418799
-0.1173801323	0.9697651612	3431/8192	0.418823
-0.1159529485	0.9722632597999999	831/1984	0.418851
-0.1158385951	0.9730208457	857/2046	0.418866
-0.1136872835	0.976115235	6863/16384	0.418884
-0.1129480633	0.9740180597	429/1024	0.418945
-0.1129480633	0.9740180597	429/1024	0.418945
-0.114968012	0.9734550911	6865/16384	0.419006
-0.108199439	0.9701438155	3433/8192	0.419067
-0.1098298723	0.969738535	751/1792	0.419085
-0.1046801195	0.9737619238	57/136	0.419118
-0.1076556372	0.976756096	6867/16384	0.419128
-0.1061939226	0.9797006407	845/2016	0.419147
-0.1110257914	0.9825780709	1717/4096	0.419189
-0.1111926365	0.9844690709	6869/16384	0.41925
-0.1114726147	0.9848174564	161/384	0.419271
-0.1118193922	0.9847778185	857/2044	0.419276
-0.1183610725	0.9852883355	3435/8192	0.419312
-0.1473292744	0.9676871829	6871/16384	0.419373
-0.1608752665	0.9803139697	859/2048	0.419434
-0.1475388416	0.9926487246	6873/16384	0.419495
-0.184373353	0.9984561764	3437/8192	0.419556
-0.2238105423	0.9708407871	6875/16384	0.419617
-0.2847939718	0.9210518678	1719/4096	0.419678
-0.2955841498	0.9432930652	6877/16384	0.419739
-0.3040166461	0.9905777401	853/2032	0.419783
-0.3017561565	0.9838416061	3439/8192	0.4198
-0.2926137607	0.9833522452	859/2046	0.419844
-0.2817079964	0.9761771465	833/1984	0.419859
-0.2811535357	0.9759716216	6879/16384	0.419861
-0.2882170938	0.9717663311	215/512	0.419922
-0.2882170938	0.9717663311	215/512	0.419922
-0.292252843	0.9785116243	6881/16384	0.419983
-0.2971169933	0.9537480626	3441/8192	0.420044
-0.28171715	0.9561960098	857/2040	0.420098
-0.2766749992	0.9507632993	6883/16384	0.420105
-0.2593387307	0.9783876441	121/288	0.420139
-0.2519432936	0.9804082804	1721/4096	0.420166
-0.2523060866	0.971636985	753/1792	0.420201
-0.2456393054	0.9906752794	6885/16384	0.420227
-0.2515727107	0.9919657795	859/2044	0.420254
-0.2704312812	1.002215406	3443/8192	0.420288
-0.2645316419	1.0069156164	269/640	0.420312
-0.300530172	1.016775594	6887/16384	0.420349
-0.2968699615	1.021157762	861/2048	0.42041
-0.2911593349	1.020145689	6889/16384	0.420471
-0.2975606255	1.027296177	3445/8192	0.420532
-0.3013048541	1.027777193	6891/16384	0.420593
-0.3221470779	1.040068385	1723/4096	0.420654
-0.3116252457	1.054026518	6893/16384	0.420715
-0.2636027042	1.1337529556	855/2032	0.420768
-0.2675093701	1.138237508	3447/8192	0.420776
-0.257769129	1.1236498013	287/682	0.420821
-0.2606367699	1.111166112	6895/16384	0.420837
-0.2693479844	1.1124230609	835/1984	0.420867
-0.2667216898	1.1146694845	431/1024	0.420898
-0.2667216898	1.114669485	431/1024	0.420898
-0.2623735223	1.12250803	6897/16384	0.420959
-0.2831483089	1.103142659	3449/8192	0.421021
-0.2683826972	1.0992450999	859/2040	0.421078
-0.2692002798	1.099423436	6899/16384	0.421082
-0.2553157876	1.0976804698	283/672	0.421131
-0.2556470333	1.097955801	1725/4096	0.421143
-0.2540193461	1.09638964	6901/16384	0.421204
-0.2536688262	1.0963136221	647/1536	0.421224
-0.2528141317	1.0971941897	123/292	0.421233
-0.2450474228	1.098168226	3451/8192	0.421265
-0.2258583596	1.068798432	6903/16384	0.421326
-0.2368897538	1.0681969848	809/1920	0.421354
-0.2349810455	1.06988524	863/2048	0.421387
-0.2371148277	1.07703266	6905/16384	0.421448
-0.2428820562	1.067649202	3453/8192	0.421509
-0.2445082398	1.0632082	6907/16384	0.42157
-0.2590234465	1.064424977	1727/4096	0.421631
-0.2579001731	1.068461819	6909/16384	0.421692
-0.2547917826	1.0755137969	857/2032	0.421752
-0.2548508131	1.07553691	3455/8192	0.421753
-0.2527032477	1.0741624963	863/2046	0.421799
-0.2518071269	1.071369868	6911/16384	0.421814
-0.2535520658	1.0717327841	27/64	0.421875
-0.2535520658	1.071732784	27/64	0.421875
-0.2532557205	1.073475232	6913/16384	0.421936
-0.2572366876	1.070159829	3457/8192	0.421997
-0.2547543762	1.067273402	6915/16384	0.422058
-0.2547596043	1.0673263406	287/680	0.422059
-0.2465422339	1.066907322	1729/4096	0.422119
-0.2466469499	1.0668116556	851/2016	0.422123
-0.2442296905	1.066854989	6917/16384	0.42218
-0.2442120783	1.0682860285	863/2044	0.422211
-0.2440877516	1.074297587	3459/8192	0.422241
-0.2529440079	1.087793856	6919/16384	0.422302
-0.2508958332	1.090904451	865/2048	0.422363
-0.2521063048	1.0900127157	811/1920	0.422396
-0.2461042674	1.089757465	6921/16384	0.422424
-0.2471362101	1.088407516	757/1792	0.422433
-0.2528355206	1.09585715	3461/8192	0.422485
-0.2536688262	1.0963136221	649/1536	0.422526
-0.2559206869	1.094554826	6923/16384	0.422546
-0.2699159622	1.089198524	1731/4096	0.422607
-0.2788324535	1.095422513	6925/16384	0.422668
-0.2844630974	1.047366788	3463/8192	0.422729
-0.2829933502	1.046859158	859/2032	0.422736
-0.2880361658	1.0427433285	865/2046	0.422776
-0.2944821889	1.040314766	6927/16384	0.422791
-0.2943518417	1.0445759046	433/1024	0.422852
-0.2943518417	1.044575905	433/1024	0.422852
-0.2953007813	1.0426955474	839/1984	0.422883
-0.2899112879	1.044247599	6929/16384	0.422913
-0.3028155438	1.055531953	3465/8192	0.422974
-0.3066253321	1.042371908	6931/16384	0.423035
-0.3048919537	1.0423488465	863/2040	0.423039
-0.2987868342	1.030619258	1733/4096	0.423096
-0.2980078212	1.0311900202	853/2016	0.423115
-0.2982832973	1.028419854	6933/16384	0.423157
-0.2969584062	1.028820391	865/2044	0.42319
-0.2900270324	1.027853992	3467/8192	0.423218
-0.2583612099	1.033131171	6935/16384	0.423279
-0.2557418247	1.020332894	867/2048	0.42334
-0.2676802283	1.017343567	6937/16384	0.423401
-0.2645316419	1.0069156164	271/640	0.423438
-0.2473713886	0.998716503	3469/8192	0.423462
-0.2120731497	1.014750166	6939/16384	0.423523
-0.1881948123	1.045798025	1735/4096	0.423584
-0.1817265253	1.041649876	6941/16384	0.423645
-0.1696064881	1.036213823	3471/8192	0.423706
-0.1718709517	1.038147236	861/2032	0.42372
-0.1718888081	1.0323916408	289/682	0.423754
-0.1767550166	1.029574173	6943/16384	0.423767
-0.1763048198	1.033069667	217/512	0.423828
-0.1763048198	1.0330696675	217/512	0.423828
-0.1731755273	1.032713165	6945/16384	0.423889
-0.1730667694	1.0327417048	841/1984	0.423891
-0.178631733	1.039827274	3473/8192	0.42395
-0.1849386255	1.036076523	6947/16384	0.424011
-0.1843193072	1.0380044187	173/408	0.42402
-0.1898904853	1.015554891	1737/4096	0.424072
-0.1921026509	1.0216506624	95/224	0.424107
-0.1905124186	1.005022873	6949/16384	0.424133
-0.185310073	1.0053791276	867/2044	0.424168
-0.1648466636	1.012326922	3475/8192	0.424194
-0.1499625794	1.039841661	6951/16384	0.424255
-0.1447188368	1.040690156	869/2048	0.424316
-0.1406072648	1.034079636	6953/16384	0.424377
-0.1423595419	1.04698043	3477/8192	0.424438
-0.1428211	1.0481300442	163/384	0.424479
-0.1460614178	1.048369179	6955/16384	0.4245
-0.1557440646	1.058106702	1739/4096	0.424561
-0.151982211	1.066583199	6957/16384	0.424622
-0.1867214852	1.094613856	3479/8192	0.424683
-0.1813032797	1.096023546	863/2032	0.424705
-0.1825939235	1.1070745356	79/186	0.424731
-0.1718474248	1.112534103	6959/16384	0.424744
-0.1721795666	1.1055412048	435/1024	0.424805
-0.1721795666	1.105541205	435/1024	0.424805
-0.179825547	1.105577504	6961/16384	0.424866
-0.1768428965	1.0993559493	843/1984	0.424899
-0.160305648	1.092173538	3481/8192	0.424927
-0.1561160313	1.107071212	6963/16384	0.424988
-0.1521929574	1.1065103813	17/40	0.425
-0.1556342052	1.127127643	1741/4096	0.425049
-0.1509366308	1.1289614333	857/2016	0.425099
-0.1532774809	1.131751055	6965/16384	0.42511
-0.1534902175	1.1327072888	653/1536	0.42513
-0.1555036073	1.1346575605	869/2044	0.425147
-0.1708439162	1.149733547	3483/8192	0.425171
-0.2225458322	1.211452437	6967/16384	0.425232
-0.2085359754	1.213064456	871/2048	0.425293
-0.2001987946	1.20385074	6969/16384	0.425354
-0.1997379632	1.220144547	3485/8192	0.425415
-0.2005370401	1.225585244	6971/16384	0.425476
-0.1859201863	1.2290549608	817/1920	0.425521
-0.1866163109	1.229799153	1743/4096	0.425537
-0.1852142954	1.226479934	6973/16384	0.425598
-0.1836168427	1.219320817	3487/8192	0.425659
-0.1855807264	1.2196871875	865/2032	0.425689
-0.186856491	1.2192594808	871/2046	0.425709
-0.1886749363	1.221270732	6975/16384	0.42572
-0.186957236	1.221705441	109/256	0.425781
-0.186957236	1.2217054412	109/256	0.425781
-0.1864310728	1.219846747	6977/16384	0.425842
-0.1844988141	1.224987791	3489/8192	0.425903
-0.1844534491	1.2251352281	845/1984	0.425907
-0.1879741953	1.225926678	6979/16384	0.425964
-0.1891155777	1.2272103161	869/2040	0.42598
-0.1966251225	1.223176882	1745/4096	0.426025
-0.1991008448	1.22181723	6981/16384	0.426086
-0.1989213187	1.2218046582	859/2016	0.426091
-0.1983652331	1.2196501358	871/2044	0.426125
-0.1949750464	1.213338397	3491/8192	0.426147
-0.1698031335	1.207031587	6983/16384	0.426208
-0.1641731439	1.201387268	873/2048	0.42627
-0.1744950843	1.188236062	6985/16384	0.426331
-0.1535156475	1.208726917	3493/8192	0.426392
-0.1539657448	1.2106616314	655/1536	0.426432
-0.1585078634	1.212641957	6987/16384	0.426453
-0.1659350534	1.22794493	1747/4096	0.426514
-0.16077053	1.2296063756	273/640	0.426563
-0.1634471326	1.234828502	6989/16384	0.426575
-0.1807178443	1.247487238	3495/8192	0.426636
-0.1802622718	1.2492641955	867/2032	0.426673
-0.1805376089	1.2500486819	291/682	0.426686
-0.1795497718	1.25139506	6991/16384	0.426697
-0.1788345252	1.2504191286	437/1024	0.426758
-0.1788345252	1.250419129	437/1024	0.426758
-0.1801413428	1.249732903	6993/16384	0.426819
-0.1737808256	1.250459203	3497/8192	0.42688
-0.1744638138	1.2479690193	765/1792	0.426897
-0.1733170262	1.2528194101	847/1984	0.426915
-0.1770430411	1.253261855	6995/16384	0.426941
-0.177647936	1.2543979495	871/2040	0.426961
-0.1806960681	1.254341711	1749/4096	0.427002
-0.1812508436	1.254561264	6997/16384	0.427063
-0.1813312654	1.2545201943	41/96	0.427083
-0.1815806384	1.254217065	873/2044	0.427104
-0.1829180398	1.253275633	3499/8192	0.427124
-0.1951513914	1.249354292	6999/16384	0.427185
-0.1961326769	1.255437499	875/2048	0.427246
-0.1905966054	1.25675641	7001/16384	0.427307
-0.1982066237	1.264602232	3501/8192	0.427368
-0.2078966795	1.267636739	7003/16384	0.427429
-0.3138244215	1.284862011	1751/4096	0.42749
-0.3220588819	1.322548683	7005/16384	0.427551
-0.2822617729	1.3789544448	821/1920	0.427604
-0.2847851479	1.382115943	3503/8192	0.427612
-0.2721334613	1.3692661369	869/2032	0.427657
-0.2693807037	1.3645975253	875/2046	0.427664
-0.2714349359	1.346595839	7007/16384	0.427673
-0.2833493617	1.3522320629	219/512	0.427734
-0.2833493617	1.352232063	219/512	0.427734
-0.2761020423	1.365761726	7009/16384	0.427795
-0.3222325007	1.339097353	3505/8192	0.427856
-0.2937292279	1.31699562	7011/16384	0.427917
-0.2946313258	1.3209831957	849/1984	0.427923
-0.2793741324	1.3070527966	291/680	0.427941
-0.2267052554	1.324901312	1753/4096	0.427979
-0.2363111207	1.3083638202	767/1792	0.428013
-0.2166590721	1.334188877	7013/16384	0.42804
-0.2198411986	1.3386019317	863/2016	0.428075
-0.2222121195	1.3433103291	125/292	0.428082
-0.229014638	1.366429909	3507/8192	0.428101
-0.2375729955	1.448181495	7015/16384	0.428162
-0.2236576833	1.451542804	877/2048	0.428223
-0.208766263	1.43869793	7017/16384	0.428284
-0.2177903264	1.4689789	3509/8192	0.428345
-0.2276869261	1.4718218	7019/16384	0.428406
-0.2786246619	1.554840663	1755/4096	0.428467
-0.2200969155	1.621890856	7021/16384	0.428528
--0.8944678879	1.398313583	3511/8192	0.428589
--0.8569447084	1.2740530894	877/2046	0.428641
--0.8522735578	1.2771782046	871/2032	0.428642
--0.8487010193	1.2837055129	823/1920	0.428646
--0.849892507	1.282894609	7023/16384	0.42865
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--0.4305463358	0.7243264569	7615/16384	0.464783
--0.4303675205	0.7242732715	317/682	0.464809
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--0.4307162512	0.7243003388	7617/16384	0.464905
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--0.4240792135	0.7944409421	941/2016	0.466766
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--0.4232781498	0.7948565281	7649/16384	0.466858
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--0.4190075569	0.799333396	927/1984	0.467238
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--0.4203307732	0.804043044	1923/4096	0.469482
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--0.4158187166	0.8016222578	1925/4096	0.469971
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--0.4190075569	0.799333396	933/1984	0.470262
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--0.4415960401	0.7884831868	949/2016	0.470734
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--0.4380582922	0.8119521802	7721/16384	0.471252
--0.4361121768	0.8101076031	935/1984	0.47127
--0.4342589943	0.8080421336	3861/8192	0.471313
--0.4342517212	0.8064307932	181/384	0.471354
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--0.4220614942	0.8189926645	937/1984	0.472278
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--0.4175709225	0.8349130759	939/1984	0.473286
--0.4193428772	0.8342466772	727/1536	0.473307
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--0.4176253418	0.8311601269	1939/4096	0.473389
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--0.4091827235	0.8246607422	1941/4096	0.473877
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--0.4117711609	0.8238866801	3883/8192	0.473999
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--0.4114719551	0.818106538	941/1984	0.474294
--0.4115441394	0.8169246392	7771/16384	0.474304
--0.4090045763	0.8157446397	1943/4096	0.474365
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--0.4042596586	0.8172749853	911/1920	0.474479
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--0.4040559016	0.8195881335	971/2046	0.474585
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--0.3956342296	0.8197356551	7785/16384	0.475159
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--0.3976100119	0.8149239881	943/1984	0.475302
--0.3951409923	0.8136297801	1947/4096	0.475342
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--0.3890855139	0.8117112493	3895/8192	0.475464
--0.3887755418	0.8160693832	913/1920	0.475521
--0.388825625	0.8155237028	7791/16384	0.475525
--0.3904833899	0.8171225697	973/2046	0.475562
--0.3905449048	0.8170069686	487/1024	0.475586
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--0.3917152656	0.8162436129	7793/16384	0.475647
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--0.3885953172	0.8292462754	945/1984	0.47631
--0.3885593005	0.8292004409	1951/4096	0.476318
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--0.3895017224	0.8292671009	325/682	0.47654
--0.3895055225	0.8292603358	61/128	0.476562
--0.3895055225	0.8292603358	61/128	0.476562
--0.3895331105	0.8291511146	7809/16384	0.476624
--0.3897123711	0.8295821673	3905/8192	0.476685
--0.3897234546	0.8295820527	961/2016	0.476687
--0.389135271	0.8294769546	7811/16384	0.476746
--0.3882159629	0.8294047459	1953/4096	0.476807
--0.3873465608	0.8280114378	7813/16384	0.476868
--0.3874948752	0.8279915538	969/2032	0.47687
--0.3909913242	0.8265715129	3907/8192	0.476929
--0.39190857	0.8279628246	973/2040	0.476961
--0.3920725292	0.8292113089	7815/16384	0.47699
--0.3926730294	0.8293251601	975/2044	0.477006
--0.3944368076	0.8290689039	977/2048	0.477051
--0.3970058155	0.8291218394	7817/16384	0.477112
--0.3940392769	0.8329688258	3909/8192	0.477173
--0.3926751315	0.8323430858999999	733/1536	0.477214
--0.3921377128	0.8318996852	7819/16384	0.477234
--0.3908608969	0.8328868266	1955/4096	0.477295
--0.3911485624	0.8332294235	947/1984	0.477319
--0.3895001706	0.8337520908	7821/16384	0.477356
--0.3879615295	0.833796246	3911/8192	0.477417
--0.38717996	0.8354926222	7823/16384	0.477478
--0.3881316741	0.8369904835999999	977/2046	0.477517
--0.3882126409	0.8369211563	489/1024	0.477539
--0.3882126409	0.8369211563	489/1024	0.477539
--0.3899254236	0.8366428033	7825/16384	0.4776
--0.389687916	0.8363504980000001	917/1920	0.477604
--0.387726257	0.8403703262	3913/8192	0.477661
--0.3852561018	0.8380094629	7827/16384	0.477722
--0.3831852571	0.836764502	1957/4096	0.477783
--0.3830345053	0.8349794021	7829/16384	0.477844
--0.3832475647	0.8346785568	971/2032	0.477854
--0.3840598925	0.8341109467	3915/8192	0.477905
--0.3839752282	0.8329804862	65/136	0.477941
--0.3840750634	0.8321147322	7831/16384	0.477966
--0.3832451937	0.831859472	977/2044	0.477984
--0.3822537707	0.8327886838	979/2048	0.478027
--0.3812817767	0.8334251906	7833/16384	0.478088
--0.3802212684	0.8315338601	3917/8192	0.478149
--0.3805121528	0.8297883184	7835/16384	0.47821
--0.3788846045	0.8297298564	1959/4096	0.478271
--0.3777038288	0.8298882928	949/1984	0.478327
--0.3776596998	0.8301957521	7837/16384	0.478333
--0.3765572026	0.8305160563	3919/8192	0.478394
--0.3759343484	0.8326480751	7839/16384	0.478455
--0.3761841814	0.8330719141	89/186	0.478495
--0.3761529896	0.8330403317	245/512	0.478516
--0.3761529896	0.8330403317	245/512	0.478516
--0.3757347998	0.8326305895	7841/16384	0.478577
--0.3775447323	0.834096778	3921/8192	0.478638
--0.3775963895	0.8337337356	919/1920	0.478646
--0.3766649201	0.8358802544	965/2016	0.478671
--0.375480464	0.8345471446	7843/16384	0.478699
--0.3733272991	0.8352325401	1961/4096	0.47876
--0.3715784898	0.8331694025	7845/16384	0.478821
--0.3724334095	0.8325556582	973/2032	0.478839
--0.3728086753	0.8316880322	3923/8192	0.478882
--0.3731167085	0.8303870026	977/2040	0.478922
--0.3730682068	0.829804101	7847/16384	0.478943
--0.3726589971	0.8292739622999999	979/2044	0.478963
--0.3713006071	0.8295323999	981/2048	0.479004
--0.3699592172	0.8287822955	7849/16384	0.479065
--0.3718367203	0.8272272748	3925/8192	0.479126
--0.3731435979	0.8275894271	7851/16384	0.479187
--0.3737142388	0.8265045058	1963/4096	0.479248
--0.3742029757	0.8249985666	7853/16384	0.479309
--0.3751935289	0.8253318352	951/1984	0.479335
--0.3753130919	0.8234063784	3927/8192	0.47937
--0.3731939181	0.8218442213	7855/16384	0.479431
--0.371230613	0.8234553315000001	327/682	0.479472
--0.3713512732	0.8235006409	491/1024	0.479492
--0.3713512732	0.8235006409	491/1024	0.479492
--0.3717796741	0.8244761386	7857/16384	0.479553
--0.369428547	0.8243953376	3929/8192	0.479614
--0.369216871	0.8225280769	967/2016	0.479663
--0.369034393	0.8218326069	7859/16384	0.479675
--0.3690017579	0.8211962873999999	307/640	0.479687
--0.3670504189	0.819964505	1965/4096	0.479736
--0.3666266846	0.8169701739	7861/16384	0.479797
--0.3679850153	0.8166909238	737/1536	0.479818
--0.3682894545	0.817225838	975/2032	0.479823
--0.3688457153	0.814437484	3931/8192	0.479858
--0.3708286977	0.8108903329	979/2040	0.479902
--0.3670388494	0.8066306048	7863/16384	0.479919
--0.3619585311	0.8041659231	981/2044	0.479941
--0.3625078522	0.8136087029	983/2048	0.47998
--0.3619678033	0.8161746555	7865/16384	0.480042
--0.3571564036	0.8165083312	3933/8192	0.480103
--0.3519610428	0.8163931107	7867/16384	0.480164
--0.3538982537	0.8203631425	1967/4096	0.480225
--0.3565409811	0.8218573833	7869/16384	0.480286
--0.359798486	0.8281930765	953/1984	0.480343
--0.3598167785	0.8281382571	3935/8192	0.480347
--0.3606233511	0.8286578821	7871/16384	0.480408
--0.3605539372	0.8284440910999999	983/2046	0.48045
--0.3605821939	0.8284625134	123/256	0.480469
--0.3605821939	0.8284625134	123/256	0.480469
--0.3607261548	0.8287057441	7873/16384	0.48053
--0.3594101019	0.8285051458	3937/8192	0.480591
--0.3613257365	0.8273003613	7875/16384	0.480652
--0.3612496188	0.8273006329	323/672	0.480655
--0.3635074312	0.8276768202	1969/4096	0.480713
--0.363125753	0.8272338653	923/1920	0.480729
--0.3639889163	0.830141653	7877/16384	0.480774
--0.3626536361	0.8300633835	977/2032	0.480807
--0.3621652307	0.8308524449	3939/8192	0.480835
--0.3605193069	0.8317114756	327/680	0.480882
--0.3603865138	0.8324330192	7879/16384	0.480896
--0.360152683	0.8336723812	983/2044	0.48092
--0.3624670527	0.8341713216	985/2048	0.480957
--0.3641580211	0.8360445427	7881/16384	0.481018
--0.3592433765	0.8376440563	3941/8192	0.481079
--0.3579300742	0.8359777639	739/1536	0.48112
--0.3575739258	0.835166958	7883/16384	0.48114
--0.355291508	0.8357116826	1971/4096	0.481201
--0.3521666391	0.8366682692	7885/16384	0.481262
--0.348820795	0.8364144426	3943/8192	0.481323
--0.3476278971	0.8380824122	955/1984	0.481351
--0.3475506407	0.839825082	7887/16384	0.481384
--0.3517609125	0.8423753309000001	985/2046	0.481427
--0.3517485781	0.8421145923	493/1024	0.481445
--0.3517485781	0.8421145923	493/1024	0.481445
--0.3534065961	0.8413116056	7889/16384	0.481506
--0.3527503156	0.8464153999	3945/8192	0.481567
--0.3478736304	0.8458259728	7891/16384	0.481628
--0.3460433111	0.845064776	971/2016	0.481647
--0.3446032513	0.8473556125	1973/4096	0.481689
--0.3408673329	0.8460680887	7893/16384	0.48175
--0.3412860646	0.8444982641	185/384	0.481771
--0.3420365011	0.8427949967	979/2032	0.481791
--0.3400356998	0.8428231488	3947/8192	0.481812
--0.3382175548	0.8357660751	983/2040	0.481863
--0.3341887315	0.8378008954	7895/16384	0.481873
--0.3233131377	0.8413814685	985/2044	0.481898
--0.334863115	0.846401683	987/2048	0.481934
--0.3362404305	0.8497686586	7897/16384	0.481995
--0.3296745895	0.8564218004	3949/8192	0.482056
--0.3174682275	0.860777486	7899/16384	0.482117
--0.3233603872	0.8709554263	1975/4096	0.482178
--0.3349372255	0.8757419856	7901/16384	0.482239
--0.3420886551	0.8762210326	3951/8192	0.4823
--0.3414870677	0.8615818923	957/1984	0.482359
--0.3415124116	0.8614866481	7903/16384	0.482361
--0.3423288033	0.8607041997	329/682	0.482405
--0.3424595791	0.8608201133	247/512	0.482422
--0.3424595791	0.8608201133	247/512	0.482422
--0.341929867	0.8622628056	7905/16384	0.482483
--0.3416792594	0.8577183014	3953/8192	0.482544
--0.3455175245	0.8590371969	7907/16384	0.482605
--0.3479144283	0.8610556824	139/288	0.482639
--0.3491333108	0.8586721334	1977/4096	0.482666
--0.3530446147	0.8617283175	7909/16384	0.482727
--0.3502750486	0.8660477688	981/2032	0.482776
--0.3520256765	0.8653768644	3955/8192	0.482788
--0.3531147286	0.8669978705	309/640	0.482812
--0.3550713185	0.8713296122	197/408	0.482843
--0.3547189951	0.8698366809	7911/16384	0.482849
--0.3578647408	0.8695656555	141/292	0.482877
--0.3569785487	0.8666888858	989/2048	0.48291
--0.3593908333	0.8656221781	7913/16384	0.482971
--0.3611211816	0.8691792948	3957/8192	0.483032
--0.3604153005	0.871931074	7915/16384	0.483093
--0.3628692463	0.873209402	1979/4096	0.483154
--0.3670908536	0.8721790489	7917/16384	0.483215
--0.3711952146	0.8704957435	3959/8192	0.483276
--0.3695221483	0.8663637166	7919/16384	0.483337
--0.3670011117	0.8682813897	959/1984	0.483367
--0.3663705713	0.8677777266	989/2046	0.483382
--0.366485667	0.8678656425	495/1024	0.483398
--0.366485667	0.8678656425	495/1024	0.483398
--0.3654975625	0.8685178668	7921/16384	0.483459
--0.3648439357	0.8659260271	3961/8192	0.483521
--0.3665688989	0.8644822363	7923/16384	0.483582
--0.3673439799	0.8626815880000001	325/672	0.483631
--0.3667385674	0.862885848	1981/4096	0.483643
--0.3674712642	0.8613844166	7925/16384	0.483704
--0.3681796081	0.861550179	743/1536	0.483724
--0.3696475453	0.8607523371	983/2032	0.48376
--0.3691414752	0.8609665312	3963/8192	0.483765
--0.3705127014	0.8570484265	329/680	0.483824
--0.3706042357	0.8573722781	7927/16384	0.483826
--0.3688259551	0.8550926796	929/1920	0.483854
--0.3689967661	0.8553114057	989/2044	0.483855
--0.3662874844	0.8542876106	991/2048	0.483887
--0.3673061808	0.8531332661	7929/16384	0.483948
--0.3686203368	0.8532059062	3965/8192	0.484009
--0.3694289566	0.853001903	7931/16384	0.48407
--0.3690749806	0.8524926915	1983/4096	0.484131
--0.3687052072	0.8523707482	7933/16384	0.484192
--0.368478315	0.8523660906	3967/8192	0.484253
--0.3685540226	0.8525318223	7935/16384	0.484314
--0.3685614238	0.8524883112	991/2046	0.48436
--0.368564577	0.8524897756000001	31/64	0.484375
--0.368564577	0.8524897756	31/64	0.484375
--0.3685684471	0.8525417918	7937/16384	0.484436
--0.3684188152	0.8523791522	3969/8192	0.484497
--0.3687158187	0.8523338548	7939/16384	0.484558
--0.3691373217	0.8523143169	1985/4096	0.484619
--0.3691495569	0.852300465	977/2016	0.484623
--0.3695542401	0.8530620437	7941/16384	0.48468
--0.3687388436	0.8533220414	3971/8192	0.484741
--0.3687204674	0.853325821	985/2032	0.484744
--0.3674022373	0.8533239181	7943/16384	0.484802
--0.3673935675	0.8532892991	989/2040	0.484804
--0.3660347672	0.8534677978	991/2044	0.484834
--0.363987169	0.8565137066	993/2048	0.484863
--0.3633714973	0.8576946455	931/1920	0.484896
--0.3608289963	0.8547522506	7945/16384	0.484924
--0.364380863	0.8507535674	3973/8192	0.484985
--0.3658090779	0.8511032937	745/1536	0.485026
--0.3662521224	0.8513290178	7947/16384	0.485046
--0.3669979939	0.8504811208	1987/4096	0.485107
--0.3679803956	0.8496318359	7949/16384	0.485168
--0.3691310813	0.8495703102	3975/8192	0.485229
--0.369746428	0.8483890982	7951/16384	0.485291
--0.3683832858	0.8472348137	331/682	0.485337
--0.3683681537	0.8473351169	497/1024	0.485352
--0.3683681537	0.8473351169	497/1024	0.485352
--0.368826982	0.8481796246	963/1984	0.485383
--0.3673413988	0.8475996572	7953/16384	0.485413
--0.3684406069	0.8445500949	3977/8192	0.485474
--0.3708899942	0.8461813721	7955/16384	0.485535
--0.3726052945	0.8470308987	1989/4096	0.485596
--0.3732503522	0.8462302823	979/2016	0.485615
--0.3728027892	0.8485184468	7957/16384	0.485657
--0.3720212151	0.8491586378	3979/8192	0.485718
--0.3721683808	0.8491386558	987/2032	0.485728
--0.3719293588	0.850680797	7959/16384	0.485779
--0.3720106944	0.8506064182999999	991/2040	0.485784
--0.372915837	0.8510296581	993/2044	0.485812
--0.3732231676	0.8501961701	995/2048	0.48584
--0.374067926	0.8498083874	7961/16384	0.485901
--0.3743099221	0.8509961922	311/640	0.485938
--0.3748079258	0.8513641532	3981/8192	0.485962
--0.374442614	0.8527154101	7963/16384	0.486023
--0.37566414	0.8530787475	1991/4096	0.486084
--0.3768511349	0.8528681154	7965/16384	0.486145
--0.3778551985	0.8529279639	3983/8192	0.486206
--0.3782838229	0.8514871474	7967/16384	0.486267
--0.3779684781	0.8507692467	995/2046	0.486315
--0.3779914382	0.8507854088	249/512	0.486328
--0.3779914382	0.8507854088	249/512	0.486328
--0.3770698392	0.8514774166	7969/16384	0.486389
--0.3772012105	0.8514591557	965/1984	0.486391
--0.3771792858	0.8495911406	3985/8192	0.48645
--0.3789855106	0.8495154143	7971/16384	0.486511
--0.3810466033	0.849322285	1993/4096	0.486572
--0.3823963417	0.851466541	7973/16384	0.486633
--0.3809312257	0.8525180372	3987/8192	0.486694
--0.3813026423	0.8530977705	989/2032	0.486713
--0.3802885493	0.8540849992	7975/16384	0.486755
--0.3805760433	0.85422327	331/680	0.486765
--0.3808025496	0.854773723	995/2044	0.486791
--0.3814253673	0.8546267263	997/2048	0.486816
--0.3821528901	0.8557217093	7977/16384	0.486877
--0.3805047608	0.8561621592	3989/8192	0.486938
--0.3799545192	0.8558815355	187/384	0.486979
--0.3797631516	0.8556568116	7979/16384	0.487
--0.3791191716	0.8561418453	1995/4096	0.487061
--0.3785659912	0.8570898917	7981/16384	0.487122
--0.3775442104	0.8580216169	3991/8192	0.487183
--0.3787943315	0.8595487733	7983/16384	0.487244
--0.3796505303	0.8583970989	997/2046	0.487292
--0.3796078715	0.8583932175	499/1024	0.487305
--0.3796078715	0.8583932175	499/1024	0.487305
--0.3798024808	0.8578186012	7985/16384	0.487366
--0.3803657078	0.858228856	967/1984	0.487399
--0.3809530886	0.8584932148	3993/8192	0.487427
--0.3807484914	0.8597658938	7987/16384	0.487488
--0.3812033111	0.8607830315	1997/4096	0.487549
--0.3811860797	0.8616753651	983/2016	0.487599
--0.3812210654	0.8619490852	7989/16384	0.48761
--0.3807495627	0.8620427188999999	749/1536	0.48763
--0.3802810623	0.8626655376	3995/8192	0.487671
--0.3802623387	0.8635839673	991/2032	0.487697
--0.3812164888	0.8651983425	7991/16384	0.487732
--0.3822424482	0.8649824216999999	199/408	0.487745
--0.3827190752	0.8640337245	997/2044	0.487769
--0.3820961372	0.8635442648	999/2048	0.487793
--0.3826342929	0.8627364799	7993/16384	0.487854
--0.3839364267	0.8631649064	3997/8192	0.487915
--0.3847195356	0.8638804081	7995/16384	0.487976
--0.3856679174	0.8629849974	937/1920	0.488021
--0.3853279641	0.8632060984	1999/4096	0.488037
--0.3854378441	0.8624091017	7997/16384	0.488098
--0.3856754806	0.8617394728	3999/8192	0.488159
--0.3850580704	0.8607911133	7999/16384	0.48822
--0.3848442687	0.8608462585	333/682	0.48827
--0.3848404926	0.8608410171	125/256	0.488281
--0.3848404926	0.8608410171	125/256	0.488281
--0.385042066	0.8607486329	8001/16384	0.488342
--0.3840980801	0.8611931098	4001/8192	0.488403
--0.3841813542	0.8611687721	969/1984	0.488407
--0.3843435509	0.860338746	8003/16384	0.488464
--0.3844165708	0.8594853691	2001/4096	0.488525
--0.3854685459	0.8587432383	8005/16384	0.488586
--0.3855869224	0.8583590953	985/2016	0.488591
--0.3860432438	0.8596796235	4003/8192	0.488647
--0.3867729234	0.8598694443	993/2032	0.488681
--0.3870442664	0.8603671913	8007/16384	0.488708
--0.3874878283	0.8601766419	997/2040	0.488725
--0.3878100705	0.8599619566	999/2044	0.488748
--0.3875997166	0.8595958009	1001/2048	0.48877
--0.388674152	0.8589639603	8009/16384	0.488831
--0.3889003599	0.8607700532	4005/8192	0.488892
--0.3883968679	0.8611817431	751/1536	0.488932
--0.3881261553	0.861216761	8011/16384	0.488953
--0.3881322448	0.8619145512	2003/4096	0.489014
--0.3883471749	0.8625066775	313/640	0.489063
--0.3883977229	0.8627289053	8013/16384	0.489075
--0.3882522137	0.8635497834	4007/8192	0.489136
--0.3890841887	0.8640738967	8015/16384	0.489197
--0.3894160732	0.8632902734	91/186	0.489247
--0.3893933311	0.8633053836	501/1024	0.489258
--0.3893933311	0.8633053836	501/1024	0.489258
--0.3895420114	0.8628090665	8017/16384	0.489319
--0.3906900694	0.8635640872	4009/8192	0.48938
--0.3905277395	0.8645990658	971/1984	0.489415
--0.3901326971	0.864515662	8019/16384	0.489441
--0.3899287912	0.8652672486	2005/4096	0.489502
--0.3893272176	0.8657414131	8021/16384	0.489563
--0.3891530227	0.8655289126	47/96	0.489583
--0.3887959954	0.865419095	4011/8192	0.489624
--0.3881416003	0.8655334964	995/2032	0.489665
--0.3876597309	0.8657317646	8023/16384	0.489685
--0.3874769473	0.8664702213	333/680	0.489706
--0.3880508881	0.8669132365	143/292	0.489726
--0.3883791229	0.8664408132	1003/2048	0.489746
--0.3890206024	0.8668849104	8025/16384	0.489807
--0.3885893852	0.8683020807	4013/8192	0.489868
--0.3870919736	0.8691513697	8027/16384	0.489929
--0.3878601806	0.8711752292	2007/4096	0.48999
--0.3907840208	0.8717583427	8029/16384	0.490051
--0.3937633848	0.8710792826	941/1920	0.490104
--0.3933703081	0.8717632376	4015/8192	0.490112
--0.3931468392	0.8695709201	8031/16384	0.490173
--0.3914011585	0.8688670312	1003/2046	0.490225
--0.3914250313	0.8688535847	251/512	0.490234
--0.3914250313	0.8688535847	251/512	0.490234
--0.3909332543	0.8691310652	8033/16384	0.490295
--0.3910594495	0.86784882	4017/8192	0.490356
--0.3922511597	0.8675935755	8035/16384	0.490417
--0.3922809319	0.8674362764	973/1984	0.490423
--0.3931519631	0.8667704615	2009/4096	0.490479
--0.3947577847	0.8663444944	8037/16384	0.49054
--0.3948435236	0.8674533644	989/2016	0.490575
--0.3953301334	0.8677341401	4019/8192	0.490601
--0.3967629917	0.8690995996000001	997/2032	0.49065
--0.3973806669	0.8687663716	8039/16384	0.490662
--0.3987931706	0.8680782254	1001/2040	0.490686
--0.3986071452	0.8670621239	1003/2044	0.490705
--0.3975958425	0.8671639524	1005/2048	0.490723
--0.3983636332	0.8656397465	8041/16384	0.490784
--0.4004926418	0.8667313481	4021/8192	0.490845
--0.4007550403	0.8685681978	8043/16384	0.490906
--0.4027932747	0.8694441166	2011/4096	0.490967
--0.4063928446	0.8672484577	8045/16384	0.491028
--0.4108366256	0.8632584471	4023/8192	0.491089
--0.4040902426	0.8602017215	943/1920	0.491146
--0.4045944585	0.859904599	8047/16384	0.49115
--0.4046130727	0.8632514594	335/682	0.491202
--0.4046762163	0.8631425308	503/1024	0.491211
--0.4046762163	0.8631425308	503/1024	0.491211
--0.4036594869	0.8641270454	8049/16384	0.491272
--0.4014956669	0.8625944898	4025/8192	0.491333
--0.4014376657	0.8607210042	8051/16384	0.491394
--0.4008895577	0.859120217	975/1984	0.491431
--0.4005208754	0.8595434073	2013/4096	0.491455
--0.3997889057	0.8583604113	8053/16384	0.491516
--0.4001448551	0.857970138	755/1536	0.491536
--0.4006682603	0.8561354922	991/2016	0.491567
--0.4002801289	0.8570365685	4027/8192	0.491577
--0.3975628702	0.8564179648	999/2032	0.491634
--0.397914567	0.8561117889	8055/16384	0.491638
--0.3975916234	0.8574596018	59/120	0.491667
--0.397936931	0.8576709340000001	1005/2044	0.491683
--0.3982249401	0.8573387535	1007/2048	0.491699
--0.3981800898	0.8582545188	8057/16384	0.49176
--0.3971980613	0.8583311634	4029/8192	0.491821
--0.3965623808	0.8580770754	8059/16384	0.491882
--0.3962858224	0.8586343519	2015/4096	0.491943
--0.3964576501	0.8591732074	8061/16384	0.492004
--0.3971170223	0.8601037327	4031/8192	0.492065
--0.3967618268	0.8608465715	8063/16384	0.492126
--0.3968559599	0.8607845705	1007/2046	0.49218
--0.3968571275	0.8607820738	63/128	0.492188
--0.3968571275	0.8607820738	63/128	0.492188
--0.3967832353	0.860850686	8065/16384	0.492249
--0.3969744941	0.8597716013	4033/8192	0.49231
--0.3972883771	0.8609222007	8067/16384	0.492371
--0.3973693247	0.8615712537	2017/4096	0.492432
--0.3973412119	0.861501925	977/1984	0.49244
--0.3966857713	0.8622589349	8069/16384	0.492493
--0.3962153713	0.8616084044	4035/8192	0.492554
--0.3962469206	0.8616478351	331/672	0.49256
--0.3954022872	0.8611563525	8071/16384	0.492615
--0.3954318226	0.8612055958	1001/2032	0.492618
--0.3948557022	0.8613375848	67/136	0.492647
--0.3947294315	0.8616443968	1007/2044	0.492661
--0.3950859103	0.8617761442	1009/2048	0.492676
--0.3942956001	0.8624533297	8073/16384	0.492737
--0.3938593959	0.8609925363	4037/8192	0.492798
--0.3942419261	0.860601361	757/1536	0.492839
--0.394467188	0.8605687623	8075/16384	0.492859
--0.3944509025	0.8599886306	2019/4096	0.49292
--0.3941921551	0.8593512071	8077/16384	0.492981
--0.3942902806	0.8587126188	4039/8192	0.493042
--0.3936684648	0.8583186364	8079/16384	0.493103
--0.3934431805	0.8588510174	1009/2046	0.493157
--0.3934528398	0.8588392057000001	505/1024	0.493164
--0.3934528398	0.8588392057	505/1024	0.493164
--0.3932617804	0.8592525447	8081/16384	0.493225
--0.3933480699	0.8592555332	947/1920	0.493229
--0.3923629441	0.8585232483	4041/8192	0.493286
--0.3929547825	0.8578559055	8083/16384	0.493347
--0.3932816962	0.8573435711	2021/4096	0.493408
--0.3935974478	0.857011658	979/1984	0.493448
--0.3937430236	0.8571644947	8085/16384	0.493469
--0.3940232048	0.857454353	4043/8192	0.49353
--0.3941690657	0.8573405673	995/2016	0.493552
--0.3947155275	0.8573487603	8087/16384	0.493591
--0.394695526	0.8571615612	1003/2032	0.493602
--0.3946016076	0.8567793996	1007/2040	0.493627
--0.3944449094	0.8567771427	1009/2044	0.49364
--0.3944211745	0.856921237	1011/2048	0.493652
--0.3941358438	0.8566020678	8089/16384	0.493713
--0.3945087384	0.8561367493	4045/8192	0.493774
--0.3950197156	0.8559642547	8091/16384	0.493835
--0.3948644254	0.855399625	2023/4096	0.493896
--0.3944135221	0.8551731453	8093/16384	0.493958
--0.3941251939	0.8548835152	4047/8192	0.494019
--0.3937524095	0.8550696753	8095/16384	0.49408
--0.3939316837	0.8553651109	337/682	0.494135
--0.3939285664	0.8553660941	253/512	0.494141
--0.3939285664	0.8553660941	253/512	0.494141
--0.3940406133	0.8555151184	8097/16384	0.494202
--0.3936358536	0.8557107617	4049/8192	0.494263
--0.393714438	0.855742012	949/1920	0.494271
--0.3933669325	0.8553687327	8099/16384	0.494324
--0.3930689811	0.8550746992	2025/4096	0.494385
--0.3930387555	0.8546338429	8101/16384	0.494446
--0.3931538566	0.8545408866	981/1984	0.494456
--0.393408671	0.8545780909	4051/8192	0.494507
--0.3935681407	0.8543513556	997/2016	0.494544
--0.3937022891	0.8542543085	8103/16384	0.494568
--0.3936530382	0.8540826467	1005/2032	0.494587
--0.393537624	0.8539682194	1009/2040	0.494608
--0.3934590512	0.853996233	1011/2044	0.494618
--0.3934859693	0.8540752042	1013/2048	0.494629
--0.3932787318	0.8537658823	8105/16384	0.49469
--0.3937371187	0.8536364121	4053/8192	0.494751
--0.3939575038	0.85383079	8107/16384	0.494812
--0.3942713401	0.8537454576	2027/4096	0.494873
--0.3945875436	0.853363903	8109/16384	0.494934
--0.3953348238	0.8529651799	4055/8192	0.494995
--0.3943528914	0.8518946346	8111/16384	0.495056
--0.3942766551	0.8525812158	1013/2046	0.495112
--0.3942741863	0.8525669380000001	507/1024	0.495117
--0.3942741863	0.852566938	507/1024	0.495117
--0.3940205524	0.852896924	8113/16384	0.495178
--0.393439572	0.8526896429	4057/8192	0.495239
--0.3932954553	0.8521318685	8115/16384	0.4953
--0.3931802238	0.8519620586	317/640	0.495312
--0.392799744	0.8517235969	2029/4096	0.495361
--0.3922738293	0.8512692204	8117/16384	0.495422
--0.3924173314	0.850995126	761/1536	0.495443
--0.3928562457	0.8507486807	983/1984	0.495464
--0.3924469384	0.8502847405	4059/8192	0.495483
--0.3898295528	0.8497637821	8119/16384	0.495544
--0.3901873925	0.8516871891	1007/2032	0.495571
--0.3907848761	0.8515251021	337/680	0.495588
--0.3909388899	0.8512943079	1013/2044	0.495597
--0.3906881187	0.8510693993	1015/2048	0.495605
--0.3912362024	0.8517515469	8121/16384	0.495667
--0.3907322149	0.8524070801	4061/8192	0.495728
--0.3902451447	0.8528755548	8123/16384	0.495789
--0.3907146023	0.8532719368	2031/4096	0.49585
--0.391102415	0.8532944982	8125/16384	0.495911
--0.3913565636	0.8534660267	4063/8192	0.495972
--0.39159934	0.8533031276	8127/16384	0.496033
--0.391453881	0.8530168455	1015/2046	0.49609
--0.3914528751	0.8530159247	127/256	0.496094
--0.3914528751	0.8530159247	127/256	0.496094
--0.3913502024	0.8529316894	8129/16384	0.496155
--0.3916728219	0.8527708653	4065/8192	0.496216
--0.3918727896	0.8530405358	8131/16384	0.496277
--0.3921172998	0.8532495055	2033/4096	0.496338
--0.392138353	0.8531352733999999	953/1920	0.496354
--0.3921821914	0.8535923333	8133/16384	0.496399
--0.39188377	0.8536551138	4067/8192	0.49646
--0.3919342409	0.8537038394000001	985/1984	0.496472
--0.3916614974	0.8538996762	8135/16384	0.496521
--0.3917081308	0.8539221383	143/288	0.496528
--0.3917226853	0.8540743334999999	1009/2032	0.496555
--0.3917955414	0.854116099	1013/2040	0.496569
--0.3918336978	0.8540919757	145/292	0.496575
--0.3918087623	0.8540530022	1017/2048	0.496582
--0.3919481601	0.8543287286	8137/16384	0.496643
--0.3915479715	0.8543336607	4069/8192	0.496704
--0.3914535911	0.8542325379	763/1536	0.496745
--0.3914460401	0.8541585882	8139/16384	0.496765
--0.3912505792	0.8541661193	2035/4096	0.496826
--0.3910718748	0.8542861213	8141/16384	0.496887
--0.3908464267	0.8543475566	4071/8192	0.496948
--0.3908714973	0.8545943537	8143/16384	0.497009
--0.3909942554	0.8545609181	339/682	0.497067
--0.3909941508	0.8545625586	509/1024	0.49707
--0.3909941508	0.8545625586	509/1024	0.49707
--0.3911411197	0.854558695	8145/16384	0.497131
--0.3910993095	0.8547940054	4073/8192	0.497192
--0.3909299261	0.8548048626	8147/16384	0.497253
--0.3908012116	0.8548812449	2037/4096	0.497314
--0.3906639979	0.854901768	8149/16384	0.497375
--0.3906526916	0.8548477982	191/384	0.497396
--0.3905867395	0.8547639248	4075/8192	0.497437
--0.390442147	0.8546812582	987/1984	0.49748
--0.3902131348	0.8546811534	8151/16384	0.497498
--0.3899748059	0.8549748081	1003/2016	0.49752
--0.3902988494	0.8551177795	1011/2032	0.497539
--0.3903726768	0.8550501261	203/408	0.497549
--0.3903676658	0.855006627	1017/2044	0.497554
--0.3903197578	0.8550060348	1019/2048	0.497559
--0.390513431	0.8551470458	8153/16384	0.49762
--0.3904151811	0.8554760212	4077/8192	0.497681
--0.3901578416	0.8558333873	8155/16384	0.497742
--0.3906905323	0.8560377648	2039/4096	0.497803
--0.390961394	0.8557905855	8157/16384	0.497864
--0.3911447213	0.8556334552	4079/8192	0.497925
--0.3910659766	0.8554641752	8159/16384	0.497986
--0.3909789758	0.8555106953	1019/2046	0.498045
--0.3909783585	0.855510973	255/512	0.498047
--0.3909783585	0.855510973	255/512	0.498047
--0.3908536881	0.8555137464	8161/16384	0.498108
--0.3908768967	0.8553266429	4081/8192	0.498169
--0.3910107294	0.8553084316	8163/16384	0.49823
--0.3911142224	0.8552499991	2041/4096	0.498291
--0.3912213978	0.8552574008	8165/16384	0.498352
--0.3912418352	0.8553522623	4083/8192	0.498413
--0.3912844303	0.8553596946000001	319/640	0.498437
--0.391355314	0.855403582	8167/16384	0.498474
--0.3913795357	0.8553773112	989/1984	0.498488
--0.3913948749	0.8553368163	335/672	0.498512
--0.3913822149	0.8553218535	1013/2032	0.498524
--0.3913716387	0.8553236462	339/680	0.498529
--0.3913700918	0.8553288762	1019/2044	0.498532
--0.3913753197	0.8553305919	1021/2048	0.498535
--0.3914036817	0.8552666555	8169/16384	0.498596
--0.3914786097	0.8553141674	4085/8192	0.498657
--0.3914937585	0.8553825282	8171/16384	0.498718
--0.3915946228	0.8553894349	2043/4096	0.498779
--0.391675094	0.8552839106	8173/16384	0.49884
--0.3917409482	0.8551274544	4087/8192	0.498901
--0.3915745089	0.8551024125	8175/16384	0.498962
--0.391575251	0.8551623449	1021/2046	0.499022
--0.3915752622	0.8551626735	511/1024	0.499023
--0.3915752622	0.8551626735	511/1024	0.499023
--0.3915585782	0.8552161311	8177/16384	0.499084
--0.3914974505	0.8551797221	4089/8192	0.499146
--0.3914957168	0.855133327	8179/16384	0.499207
--0.391466583	0.855109255	2045/4096	0.499268
--0.3914441132	0.855089926	8181/16384	0.499329
--0.3914488125	0.8550785241	767/1536	0.499349
--0.3914391184	0.8550518076	4091/8192	0.49939
--0.3913561204	0.8550672792	8183/16384	0.499451
--0.3913842808	0.8551093111	959/1920	0.499479
--0.3913955558	0.8551036990999999	991/1984	0.499496
--0.391398068	0.8550978879	1007/2016	0.499504
--0.3913958519	0.8550946187	1015/2032	0.499508
--0.391393493	0.8550950659	1019/2040	0.49951
--0.3913932753	0.8550962293	1021/2044	0.499511
--0.391394384	0.8550964898	1023/2048	0.499512
--0.3914120626	0.8551104609	8185/16384	0.499573
--0.391402631	0.8551300768	4093/8192	0.499634
--0.3913953456	0.8551465624	8187/16384	0.499695
--0.3914132083   0.8551480487	2047/4096	0.499756
--0.3914188966	0.8551399997	8189/16384	0.499817
--0.3914173879	0.8551357789	1/2	0.5
--0.3914173879	0.8551357789	1/2	0.5
--0.3914189083	0.8551399959	8195/16384	0.500183
--0.3914133134	0.8551480759	2049/4096	0.500244
--0.3913952562	0.8551466277	8197/16384	0.500305
--0.3914025495	0.8551300788	4099/8192	0.500366
--0.3913937157	0.8550961514	1025/2048	0.500488
--0.391393493	0.8550950659	1021/2040	0.50049
--0.3913958519	0.8550946187	1017/2032	0.500492
--0.391398068	0.8550978879	1009/2016	0.500496
--0.3913842808	0.8551093111	961/1920	0.500521
--0.3913553014	0.8550672205	8201/16384	0.500549
--0.391439809	0.8550515566	4101/8192	0.50061
--0.3914488125	0.8550785241	769/1536	0.500651
--0.3914442643	0.8550900377	8203/16384	0.500671
--0.3914671074	0.8551093935	2051/4096	0.500732
--0.3914958437	0.8551336318	8205/16384	0.500793
--0.3914980013	0.8551801456	4103/8192	0.500854
--0.3915593278	0.8552158707	8207/16384	0.500916
--0.3915789154	0.8551660694	513/1024	0.500977
--0.3915789154	0.8551660694	513/1024	0.500977
--0.3915789106	0.8551664136	1025/2046	0.500978
--0.3915746238	0.8551013832	8209/16384	0.501038
--0.3917460843	0.8551293224	4105/8192	0.501099
--0.3916734427	0.8552852174	8211/16384	0.50116
--0.3915897241	0.8553897708	2053/4096	0.501221
--0.3914937925	0.85538136	8213/16384	0.501282
--0.3914778483	0.8553131707	4107/8192	0.501343
--0.3914028339	0.8552663235	8215/16384	0.501404
--0.3913722158	0.8553287243	1027/2048	0.501465
--0.3913948749	0.8553368163	337/672	0.501488
--0.3913795357	0.8553773112	995/1984	0.501512
--0.3913536662	0.8554034725	8217/16384	0.501526
--0.3912844303	0.8553596946000001	321/640	0.501563
--0.3912415958	0.8553500676	4109/8192	0.501587
--0.3912222626	0.8552562122	8219/16384	0.501648
--0.3911115102	0.8552462438	2055/4096	0.501709
--0.3910097355	0.8553064364	8221/16384	0.50177
--0.390871634	0.855326868	4111/8192	0.501831
--0.3908533258	0.8555177596	8223/16384	0.501892
--0.3909614492	0.8554822229	257/512	0.501953
--0.3909614492	0.8554822229	257/512	0.501953
--0.3909608277	0.8554824209	1027/2046	0.501955
--0.3910666923	0.8554665966	8225/16384	0.502014
--0.3911420526	0.8556398536	4113/8192	0.502075
--0.3909553948	0.8557873485	8227/16384	0.502136
--0.3906610919	0.8560156538	2057/4096	0.502197
--0.3901792588	0.8558267175	8229/16384	0.502258
--0.3904282968	0.8554709098	4115/8192	0.502319
--0.3905190825	0.8551432601	8231/16384	0.50238
--0.3903515059	0.8550134449	1029/2048	0.502441
--0.3903676658	0.855006627	1027/2044	0.502446
--0.3903726768	0.8550501261	205/408	0.502451
--0.3902988494	0.8551177795	1021/2032	0.502461
--0.3902260552	0.8546936347	8233/16384	0.502502
--0.390442147	0.8546812582	997/1984	0.50252
--0.3905842828	0.8547712727	4117/8192	0.502563
--0.3906526916	0.8548477982	193/384	0.502604
--0.3906616451	0.8549045251	8235/16384	0.502625
--0.3908041394	0.8548890272	2059/4096	0.502686
--0.3909297084	0.8548081028	8237/16384	0.502747
--0.391104055	0.854797706	4119/8192	0.502808
--0.391144829	0.8545560106	8239/16384	0.502869
--0.3910102487	0.854580231	515/1024	0.50293
--0.3910102487	0.854580231	515/1024	0.50293
--0.3910101168	0.8545818066	343/682	0.502933
--0.390874101	0.8545909326	8241/16384	0.502991
--0.3908565905	0.8543513802	4121/8192	0.503052
--0.3910703399	0.85429148	8243/16384	0.503113
--0.3912479943	0.8541803504	2061/4096	0.503174
--0.3914407851	0.8541593835	8245/16384	0.503235
--0.3915403461	0.8543395805	4123/8192	0.503296
--0.3919514351	0.8543415256	8247/16384	0.503357
--0.39181919	0.8540813716	1031/2048	0.503418
--0.3918336978	0.8540919757	147/292	0.503425
--0.3917955414	0.854116099	1027/2040	0.503431
--0.3917226853	0.8540743334999999	1023/2032	0.503445
--0.3917081308	0.8539221383	145/288	0.503472
--0.3916686655	0.853904475	8249/16384	0.503479
--0.391886654	0.8536692465	4125/8192	0.50354
--0.3921787912	0.8536058763	8251/16384	0.503601
--0.392138353	0.8531352733999999	967/1920	0.503646
--0.3921511492	0.8532568843	2063/4096	0.503662
--0.3918854097	0.85304342	8253/16384	0.503723
--0.3916829521	0.8527471016	4127/8192	0.503784
--0.3913395085	0.8529264761	8255/16384	0.503845
--0.3915070053	0.8532254842	129/256	0.503906
--0.3915070053	0.8532254842	129/256	0.503906
--0.3915921394	0.8532984081	8257/16384	0.503967
--0.3913573197	0.8534500791	4129/8192	0.504028
--0.3911135857	0.8532896095	8259/16384	0.504089
--0.3907435863	0.853236731	2065/4096	0.50415
--0.390276983	0.8528952667	8261/16384	0.504211
--0.390763321	0.8524379063	4131/8192	0.504272
--0.3912702829	0.8517743916	8263/16384	0.504333
--0.3908277195	0.8512558297	1033/2048	0.504395
--0.3909388899	0.8512943079	1031/2044	0.504403
--0.3907848761	0.8515251021	343/680	0.504412
--0.3901873925	0.8516871891	1025/2032	0.504429
--0.3899839339	0.8498993505	8265/16384	0.504456
--0.3923050911	0.8502899405	4133/8192	0.504517
--0.3928562457	0.8507486807	1001/1984	0.504536
--0.3924173314	0.850995126	775/1536	0.504557
--0.392239966	0.8512457241	8267/16384	0.504578
--0.392710274	0.8517333073	2067/4096	0.504639
--0.3931802238	0.8519620586	323/640	0.504687
--0.3932687555	0.8521129293	8269/16384	0.5047
--0.393398032	0.8527045218	4135/8192	0.504761
--0.3940058694	0.8529196299	8271/16384	0.504822
--0.3940866958	0.8524694942	517/1024	0.504883
--0.3940866958	0.8524694942	517/1024	0.504883
--0.3943379263	0.8519550404	8273/16384	0.504944
--0.3952726299	0.8528669456	4137/8192	0.505005
--0.3946061788	0.8533399147	8275/16384	0.505066
--0.3942991197	0.8537029304	2069/4096	0.505127
--0.3939715527	0.8538328908	8277/16384	0.505188
--0.3937566947	0.8536228627	4139/8192	0.505249
--0.393273009	0.8537433891	8279/16384	0.50531
--0.3934803337	0.8540208921	1035/2048	0.505371
--0.3934590512	0.853996233	1033/2044	0.505382
--0.393537624	0.8539682194	1031/2040	0.505392
--0.3936530382	0.8540826467	1027/2032	0.505413
--0.3936937325	0.8542401746	8281/16384	0.505432
--0.3935681407	0.8543513556	1019/2016	0.505456
--0.3934154372	0.8545578502	4141/8192	0.505493
--0.3931538566	0.8545408866	1003/1984	0.505544
--0.3930497416	0.8546213914	8283/16384	0.505554
--0.3930446375	0.8550428976	2071/4096	0.505615
--0.3933583878	0.8553552983	8285/16384	0.505676
--0.393714438	0.855742012	971/1920	0.505729
--0.3936069455	0.855721661	4143/8192	0.505737
--0.394041414	0.8555308204	8287/16384	0.505798
--0.3938539514	0.8552256369	259/512	0.505859
--0.3938539514	0.8552256369	259/512	0.505859
--0.3938510778	0.8552266792	345/682	0.505865
--0.3937536462	0.8550829193	8289/16384	0.50592
--0.3941025902	0.8549009087	4145/8192	0.505981
--0.3943985807	0.8551604465	8291/16384	0.506042
--0.3948046627	0.8553590743	2073/4096	0.506104
--0.3950457548	0.8559370816	8293/16384	0.506165
--0.3945271289	0.8561044032	4147/8192	0.506226
--0.3941328946	0.8565758597	8295/16384	0.506287
--0.3944608271	0.8568316725	1037/2048	0.506348
--0.3944449094	0.8567771427	1035/2044	0.50636
--0.3946016076	0.8567793996	1033/2040	0.506373
--0.394695526	0.8571615612	1029/2032	0.506398
--0.3947357404	0.8573074666	8297/16384	0.506409
--0.3941690657	0.8573405673	1021/2016	0.506448
--0.3940593834	0.8574577927	4149/8192	0.50647
--0.3937580028	0.8571783749	8299/16384	0.506531
--0.3935974478	0.857011658	1005/1984	0.506552
--0.3933424903	0.8573175718	2075/4096	0.506592
--0.3929867168	0.8578461357	8301/16384	0.506653
--0.3923650497	0.8584302333	4151/8192	0.506714
--0.3933480699	0.8592555332	973/1920	0.506771
--0.3932129463	0.8592619464	8303/16384	0.506775
--0.3934326898	0.8586257791	519/1024	0.506836
--0.3934326898	0.8586257791	519/1024	0.506836
--0.3934419819	0.8586156343	1037/2046	0.506843
--0.3936374316	0.8583206993	8305/16384	0.506897
--0.3942479358	0.858666926	4153/8192	0.506958
--0.3942093034	0.8593157409	8307/16384	0.507019
--0.3944579909	0.8598810583	2077/4096	0.50708
--0.3945063428	0.8605493246	8309/16384	0.507141
--0.3942419261	0.860601361	779/1536	0.507161
--0.3939118256	0.8609058963	4155/8192	0.507202
--0.3941747421	0.862387119	8311/16384	0.507263
--0.3948707569	0.8616485722	1039/2048	0.507324
--0.3947294315	0.8616443968	1037/2044	0.507339
--0.3948557022	0.8613375848	69/136	0.507353
--0.3954318226	0.8612055958	1031/2032	0.507382
--0.3953399416	0.861155703	8313/16384	0.507385
--0.3962469206	0.8616478351	341/672	0.50744
--0.3961436099	0.861562657	4157/8192	0.507446
--0.3966233325	0.8621995945	8315/16384	0.507507
--0.3973412119	0.861501925	1007/1984	0.50756
--0.397279707	0.8617165869	2079/4096	0.507568
--0.3972710637	0.8609665356	8317/16384	0.507629
--0.3966689442	0.8599000473	4159/8192	0.50769
--0.3969081585	0.8591768622	8319/16384	0.507751
--0.3968369954	0.8592546113	65/128	0.507812
--0.3968369954	0.8592546113	65/128	0.507812
--0.3968371581	0.8592524407	1039/2046	0.50782
--0.396889647	0.8591794454	8321/16384	0.507874
--0.3967867446	0.8602241885	4161/8192	0.507935
--0.3964532238	0.8592068178	8323/16384	0.507996
--0.3962746938	0.8587360273	2081/4096	0.508057
--0.3965086149	0.8580779762	8325/16384	0.508118
--0.3971261608	0.8583425661	4163/8192	0.508179
--0.3981269498	0.8583134876	8327/16384	0.50824
--0.3979830164	0.857517502	1041/2048	0.508301
--0.397936931	0.8576709340000001	1039/2044	0.508317
--0.3975916234	0.8574596018	61/120	0.508333
--0.3978582547	0.856254267	8329/16384	0.508362
--0.3975628702	0.8564179648	1033/2032	0.508366
--0.4000996632	0.8568591136	4165/8192	0.508423
--0.4006682603	0.8561354922	1025/2016	0.508433
--0.4001448551	0.857970138	781/1536	0.508464
--0.3998077578	0.8582634581	8331/16384	0.508484
--0.4003497998	0.8592840043	2083/4096	0.508545
--0.4008895577	0.859120217	1009/1984	0.508569
--0.4014390527	0.8605619803	8333/16384	0.508606
--0.4012689906	0.8623796296	4167/8192	0.508667
--0.4033919091	0.8641355742	8335/16384	0.508728
--0.4039069959	0.8616158733	521/1024	0.508789
--0.4039069959	0.8616158733	521/1024	0.508789
--0.4043771892	0.8601775836	8337/16384	0.50885
--0.4040902426	0.8602017215	977/1920	0.508854
--0.4098071807	0.862113199	4169/8192	0.508911
--0.4069089134	0.8670742474	8339/16384	0.508972
--0.4038563868	0.8696368586	2085/4096	0.509033
--0.4007369332	0.8688017984	8341/16384	0.509094
--0.400698598	0.8669585366	4171/8192	0.509155
--0.3986043043	0.8656057984	8343/16384	0.509216
--0.3982657054	0.867250852	1043/2048	0.509277
--0.3986071452	0.8670621239	1041/2044	0.509295
--0.3987931706	0.8680782254	1039/2040	0.509314
--0.3976254451	0.8687194311	8345/16384	0.509338
--0.3967629917	0.8690995996000001	1035/2032	0.50935
--0.395490938	0.8679221999	4173/8192	0.509399
--0.3948435236	0.8674533644	1027/2016	0.509425
--0.3948136719	0.8664969755	8347/16384	0.50946
--0.3934878167	0.866758618	2087/4096	0.509521
--0.3922809319	0.8674362764	1011/1984	0.509577
--0.3923616683	0.867642552	8349/16384	0.509583
--0.3912041426	0.867741457	4175/8192	0.509644
--0.3908832338	0.8690092792	8351/16384	0.509705
--0.3925586676	0.8699606009	261/512	0.509766
--0.3925586676	0.8699606009	261/512	0.509766
--0.3925855371	0.8699338547	1043/2046	0.509775
--0.3930264565	0.8694706836	8353/16384	0.509827
--0.3936000107	0.8713669622	4177/8192	0.509888
--0.3937633848	0.8710792826	979/1920	0.509896
--0.3909822848	0.871989925	8355/16384	0.509949
--0.3880867073	0.8720449259	2089/4096	0.51001
--0.3868388097	0.8691471592	8357/16384	0.510071
--0.3884092561	0.8684326309	4179/8192	0.510132
--0.3890018127	0.8669939899	8359/16384	0.510193
--0.3880965094	0.866673758	1045/2048	0.510254
--0.3874769473	0.8664702213	347/680	0.510294
--0.387532004	0.8657995578	8361/16384	0.510315
--0.3881416003	0.8655334964	1037/2032	0.510335
--0.3887050352	0.8653757487	4181/8192	0.510376
--0.3891530227	0.8655289126	49/96	0.510417
--0.389292557	0.8656930291	8363/16384	0.510437
--0.3897663066	0.8653177034	2091/4096	0.510498
--0.3900612161	0.8645297964	8365/16384	0.510559
--0.3905277395	0.8645990658	1013/1984	0.510585
--0.3906792439	0.8637337412	4183/8192	0.51062
--0.3896196181	0.8628155448	8367/16384	0.510681
--0.389313241	0.8636919202	523/1024	0.510742
--0.389313241	0.8636919202	523/1024	0.510742
--0.3892905325	0.8637052385	95/186	0.510753
--0.3891446292	0.8640896937	8369/16384	0.510803
--0.3882792542	0.8636681539	4185/8192	0.510864
--0.3883446918	0.8627666145	8371/16384	0.510925
--0.3880408894	0.8620396126	2093/4096	0.510986
--0.3880704495	0.8612106241	8373/16384	0.511047
--0.3883968679	0.8611817431	785/1536	0.511068
--0.3887986972	0.8608303837	4187/8192	0.511108
--0.3887180881	0.8590831713	8375/16384	0.511169
--0.3876865675	0.859865772	1047/2048	0.51123
--0.3878100705	0.8599619566	1045/2044	0.511252
--0.3874878283	0.8601766419	1043/2040	0.511275
--0.3871010407	0.8604188097	8377/16384	0.511292
--0.3867729234	0.8598694443	1039/2032	0.511319
--0.3860626172	0.8597885407	4189/8192	0.511353
--0.3855869224	0.8583590953	1031/2016	0.511409
--0.3854619929	0.858849711	8379/16384	0.511414
--0.384622228	0.859482735	2095/4096	0.511475
--0.3844049948	0.8603405171	8381/16384	0.511536
--0.3841222071	0.8610615427	4191/8192	0.511597
--0.384790576	0.8620259457	8383/16384	0.511658
--0.3850011569	0.8619652876	131/256	0.511719
--0.3850011569	0.8619652876	131/256	0.511719
--0.3849964354	0.8619605057	349/682	0.51173
--0.3848121204	0.8620681356	8385/16384	0.51178
--0.3856879791	0.8616229051	4193/8192	0.511841
--0.3854943688	0.8623993194	8387/16384	0.511902
--0.3855136817	0.8631389362	2097/4096	0.511963
--0.3856679174	0.8629849974	983/1920	0.511979
--0.3847664771	0.8639873776	8389/16384	0.512024
--0.3840019929	0.8632897798	4195/8192	0.512085
--0.3827344165	0.8628064682	8391/16384	0.512146
--0.3823972299	0.863984053	1049/2048	0.512207
--0.3827190752	0.8640337245	1047/2044	0.512231
--0.3814723035	0.8654437143	8393/16384	0.512268
--0.3802623387	0.8635839673	1041/2032	0.512303
--0.3800306603	0.8627838183	4197/8192	0.512329
--0.3807495627	0.8620427188999999	787/1536	0.51237
--0.3811176404	0.8619265313	8395/16384	0.51239
--0.3811860797	0.8616753651	1033/2016	0.512401
--0.3809910619	0.8609536991	2099/4096	0.512451
--0.3806385455	0.8597872985	8397/16384	0.512512
--0.3808972308	0.8586688045	4199/8192	0.512573
--0.3803657078	0.858228856	1017/1984	0.512601
--0.3798674439	0.8578923066	8399/16384	0.512634
--0.3790938986	0.8588632798	525/1024	0.512695
--0.3790938986	0.8588632798	525/1024	0.512695
--0.3790411476	0.8588598891	1049/2046	0.512708
--0.3789208857	0.8596397846	8401/16384	0.512756
--0.3772785493	0.8582212792	4201/8192	0.512817
--0.3784677049	0.8570191117	8403/16384	0.512878
--0.3789027523	0.8560202411	2101/4096	0.512939
--0.3797737296	0.8555756661	8405/16384	0.513
--0.3799545192	0.8558815355	197/384	0.513021
--0.3804461579	0.8560364686	4203/8192	0.513062
--0.3819747041	0.8556962564	8407/16384	0.513123
--0.3809864114	0.8546293137	1051/2048	0.513184
--0.3808025496	0.854773723	1049/2044	0.513209
--0.3805760433	0.85422327	349/680	0.513235
--0.3801863166	0.8541586177	8409/16384	0.513245
--0.3813026423	0.8530977705	1043/2032	0.513287
--0.3807148471	0.8524920572	4205/8192	0.513306
--0.3822086666	0.8513489523	8411/16384	0.513367
--0.380806574	0.8498272795	2103/4096	0.513428
--0.3789329536	0.8496798334	8413/16384	0.513489
--0.3774596926	0.8496500455	4207/8192	0.51355
--0.3772012105	0.8514591557	1019/1984	0.513609
--0.3772107019	0.8513735892	8415/16384	0.513611
--0.3775149247	0.8520001122	263/512	0.513672
--0.3775149247	0.8520001122	263/512	0.513672
--0.3775360621	0.8520121626	1051/2046	0.513685
--0.3784385526	0.8514041261	8417/16384	0.513733
--0.3780379816	0.8529855197	4209/8192	0.513794
--0.376845065	0.8529837127	8419/16384	0.513855
--0.3757302129	0.8534550723	2105/4096	0.513916
--0.3742560093	0.8527617862	8421/16384	0.513977
--0.3746105008	0.85148584	4211/8192	0.514038
--0.3743099221	0.8509961922	329/640	0.514062
--0.3740363538	0.8499818052	8423/16384	0.514099
--0.3728975193	0.8506598712	1053/2048	0.51416
--0.372915837	0.8510296581	1051/2044	0.514188
--0.3720106944	0.8506064182999999	1049/2040	0.514216
--0.3718093207	0.8508655401	8425/16384	0.514221
--0.3721683808	0.8491386558	1045/2032	0.514272
--0.3718008354	0.8491629613	4213/8192	0.514282
--0.3726861807	0.8484276246	8427/16384	0.514343
--0.3721692876	0.8473428482	2107/4096	0.514404
--0.3706895348	0.8463642678	8429/16384	0.514465
--0.3688819057	0.8451120236	4215/8192	0.514526
--0.3674887046	0.8473527727	8431/16384	0.514587
--0.368826982	0.8481796246	1021/1984	0.514617
--0.3691601989	0.8482966417	527/1024	0.514648
--0.3691601989	0.8482966417	527/1024	0.514648
--0.3691498652	0.8483669156	351/682	0.514663
--0.3698784409	0.8482875827	8433/16384	0.514709
--0.3693749574	0.8496742299	4217/8192	0.514771
--0.3680215869	0.8498019599	8435/16384	0.514832
--0.3673310508	0.8507432891	2109/4096	0.514893
--0.3662849702	0.8515186939	8437/16384	0.514954
--0.3658090779	0.8511032937	791/1536	0.514974
--0.3647310391	0.8512127542	4219/8192	0.515015
--0.3616031919	0.8543101125	8439/16384	0.515076
--0.3633714973	0.8576946455	989/1920	0.515104
--0.3666141822	0.8583819290	1055/2048	0.515137
--0.3671433313	0.8591482136	1053/2044	0.515166
--0.365676178	0.8598812997	1051/2040	0.515196
--0.3656853804	0.8599299261	8441/16384	0.515198
--0.3639250215	0.8602125095000001	1047/2032	0.515256
--0.3639468382	0.8602131738	4221/8192	0.515259
--0.3628249792	0.8607229637	8443/16384	0.51532
--0.3634928374	0.8613699579	1039/2016	0.515377
--0.3634767575	0.861374725	2111/4096	0.515381
--0.3640826627	0.8614323741	8445/16384	0.515442
--0.3644126148	0.8613574521	4223/8192	0.515503
--0.3642428955	0.8611422907	8447/16384	0.515564
--0.3642419141	0.8612080264	33/64	0.515625
--0.3642419141	0.8612080264	33/64	0.515625
--0.3642480054	0.8612069553	1055/2046	0.51564
--0.3642149543	0.8611372468	8449/16384	0.515686
--0.3644882279	0.8612971725	4225/8192	0.515747
--0.3640939844	0.8614948890	8451/16384	0.515808
--0.3635069523	0.8617025756	2113/4096	0.515869
--0.3625792834	0.8606920792	8453/16384	0.51593
--0.3637119292	0.8600978646	4227/8192	0.515991
--0.3654789886	0.8597400724	8455/16384	0.516052
--0.3683359373	0.8560660317	1057/2048	0.516113
--0.3689967661	0.8553114057	1055/2044	0.516145
--0.3688259551	0.8550926796	991/1920	0.516146
--0.3709374948	0.8569657978	8457/16384	0.516174
--0.3705127014	0.8570484265	351/680	0.516176
--0.3696545942	0.8610669968	4229/8192	0.516235
--0.3696475453	0.8607523371	1049/2032	0.51624
--0.3681796081	0.861550179	793/1536	0.516276
--0.3676320143	0.8615331529	8459/16384	0.516296
--0.3672987836	0.8628304274	2115/4096	0.516357
--0.3673439799	0.8626815880000001	347/672	0.516369
--0.3668162301	0.8645908825	8461/16384	0.516418
--0.3653098157	0.8656902358	4231/8192	0.516479
--0.3654646982	0.8681839327	8463/16384	0.516541
--0.3685552655	0.867203289	529/1024	0.516602
--0.3685552655	0.867203289	529/1024	0.516602
--0.3686990403	0.86726056	1057/2046	0.516618
--0.3678714162	0.8671025023	1025/1984	0.516633
--0.3692928828	0.8660710129	8465/16384	0.516663
--0.372011137	0.8696574996	4233/8192	0.516724
--0.3675257603	0.8726978009	8467/16384	0.516785
--0.3635360239	0.8749103829	2117/4096	0.516846
--0.3599429902	0.8721378286	8469/16384	0.516907
--0.3607358756	0.8697240937	4235/8192	0.516968
--0.3593979641	0.8662840665	8471/16384	0.517029
--0.3570429598	0.8687943259	1059/2048	0.51709
--0.3578647408	0.8695656555	151/292	0.517123
--0.355128168	0.8705650497	8473/16384	0.517151
--0.3550713185	0.8713296122	211/408	0.517157
--0.3531147286	0.8669978705	331/640	0.517188
--0.3513041732	0.8663099943	4237/8192	0.517212
--0.3502750486	0.8660477688	1051/2032	0.517224
--0.3522924742	0.8620063945	8475/16384	0.517273
--0.3491510722	0.8605849525	2119/4096	0.517334
--0.3479144283	0.8610556824	149/288	0.517361
--0.3453098936	0.8596690161	8477/16384	0.517395
--0.3427254373	0.8582772108	4239/8192	0.517456
--0.3411709034	0.8701627515	8479/16384	0.517517
--0.3401188752	0.8716582673	265/512	0.517578
--0.3402057054	0.8693343503	8481/16384	0.517639
--0.3442316747	0.8751663619	4241/8192	0.5177
--0.3351902368	0.8778839414	8483/16384	0.517761
--0.3220793964	0.8812956875	2121/4096	0.517822
--0.3133142069	0.8579778679	8485/16384	0.517883
--0.3265240688	0.8551606836	4243/8192	0.517944
--0.3349135682	0.8497411915	8487/16384	0.518005
--0.3306090496	0.8421659119	1061/2048	0.518066
--0.3233131377	0.8413814685	1059/2044	0.518102
--0.3336790285	0.8351051144	8489/16384	0.518127
--0.3382175548	0.8357660751	1057/2040	0.518137
--0.3407749227	0.8416421831	4245/8192	0.518188
--0.3420365011	0.8427949967	1053/2032	0.518209
--0.3412860646	0.8444982641	199/384	0.518229
--0.3414405259	0.8456283348	8491/16384	0.51825
--0.3442838278	0.8456123893	2123/4096	0.518311
--0.3460433111	0.845064776	1045/2016	0.518353
--0.3479519447	0.8450938524	8493/16384	0.518372
--0.3515594031	0.8457849166	4247/8192	0.518433
--0.3531339876	0.8418938326	8495/16384	0.518494
--0.348808585	0.8396821913	531/1024	0.518555
--0.348808585	0.8396821913	531/1024	0.518555
--0.3488067141	0.8394178619	1061/2046	0.518573
--0.3472521134	0.8403673477	8497/16384	0.518616
--0.3476278971	0.8380824122	1029/1984	0.518649
--0.3476390632	0.8358326736	4249/8192	0.518677
--0.3522530874	0.8359956517	8499/16384	0.518738
--0.3550967185	0.8343507476	2125/4096	0.518799
--0.3579097683	0.8348794947	8501/16384	0.51886
--0.3579300742	0.8359777639	797/1536	0.51888
--0.3593373233	0.8367676758	4251/8192	0.518921
--0.3634137892	0.8359078171	8503/16384	0.518982
--0.360996681	0.8335277241	1063/2048	0.519043
--0.360152683	0.8336723812	1061/2044	0.51908
--0.3599783035	0.8323810684	8505/16384	0.519104
--0.3605193069	0.8317114756	353/680	0.519118
--0.361794969	0.8305208466	4253/8192	0.519165
--0.3626536361	0.8300633835	1055/2032	0.519193
--0.3637242946	0.8297910545	8507/16384	0.519226
--0.363125753	0.8272338653	997/1920	0.519271
--0.3627311902	0.828237809	2127/4096	0.519287
--0.3612496188	0.8273006329	349/672	0.519345
--0.3611403615	0.8275878751	8509/16384	0.519348
--0.3585524965	0.8214890517	4255/8192	0.519409
--0.3576920486	0.8204363118	8511/16384	0.51947
--0.3576587215	0.8207336136	133/256	0.519531
--0.3576587215	0.8207336136	133/256	0.519531
--0.3576939917	0.8207837511	1063/2046	0.51955
--0.3575563225	0.8202958597	8513/16384	0.519592
--0.3592830916	0.8212241724	4257/8192	0.519653
--0.3592708083	0.8213821007	1031/1984	0.519657
--0.3561738245	0.8223108615	8515/16384	0.519714
--0.3520446973	0.8218415224	2129/4096	0.519775
--0.351317311	0.8147673155	8517/16384	0.519836
--0.3569179512	0.8152104292	4259/8192	0.519897
--0.3616696677	0.8154585647	8519/16384	0.519958
--0.363442319	0.8093260073	1065/2048	0.52002
--0.3619585311	0.8041659231	1063/2044	0.520059
--0.3685319381	0.8043549264	8521/16384	0.520081
--0.3708286977	0.8108903329	1061/2040	0.520098
--0.3701697662	0.8150338757	4261/8192	0.520142
--0.3682894545	0.817225838	1057/2032	0.520177
--0.3679850153	0.8166909238	799/1536	0.520182
--0.3670391149	0.8174131556	8523/16384	0.520203
--0.3683173138	0.8197221734	2131/4096	0.520264
--0.3690017579	0.8211962873999999	333/640	0.520312
--0.3694582247	0.8219413409	8525/16384	0.520325
--0.369216871	0.8225280769	1049/2016	0.520337
--0.3697217067	0.8238816329	4263/8192	0.520386
--0.3715894809	0.8242204818	8527/16384	0.520447
--0.3733274214	0.8228345173	533/1024	0.520508
--0.3733274214	0.8228345173	533/1024	0.520508
--0.3734425125	0.8229293436	355/682	0.520528
--0.3729422056	0.8214067535	8529/16384	0.520569
--0.3760736177	0.8233349221	4265/8192	0.52063
--0.3751935289	0.8253318352	1033/1984	0.520665
--0.3743535903	0.8252648078	8531/16384	0.520691
--0.3741353489	0.8269315853	2133/4096	0.520752
--0.3730816697	0.8277830181	8533/16384	0.520813
--0.371948296	0.827573162	4267/8192	0.520874
--0.3703833736	0.8288276384	8535/16384	0.520935
--0.372266701	0.829570751	1067/2048	0.520996
--0.3726589971	0.8292739622999999	1065/2044	0.521037
--0.3732890663	0.8296833553	8537/16384	0.521057
--0.3731167085	0.8303870026	1063/2040	0.521078
--0.3732105671	0.8317746809	4269/8192	0.521118
--0.3724334095	0.8325556582	1059/2032	0.521161
--0.3719241581	0.8333761601	8539/16384	0.521179
--0.3737107155	0.8344388703	2135/4096	0.52124
--0.3755748971	0.834309891	8541/16384	0.521301
--0.3766649201	0.8358802544	1051/2016	0.521329
--0.3775963895	0.8337337356	1001/1920	0.521354
--0.3771122046	0.8339527212	4271/8192	0.521362
--0.3775629581	0.8315599144	8543/16384	0.521423
--0.3773341335	0.8312378432	267/512	0.521484
--0.3773341335	0.8312378432	267/512	0.521484
--0.3773061425	0.8312099526	97/186	0.521505
--0.3777449858	0.8315580076	8545/16384	0.521545
--0.3762258361	0.8303594743	4273/8192	0.521606
--0.3777143066	0.8300151065	8547/16384	0.521667
--0.3777038288	0.8298882928	1035/1984	0.521673
--0.3789887706	0.829112336	2137/4096	0.521729
--0.3808218376	0.8298359854	8549/16384	0.52179
--0.3805732292	0.8314727022	4275/8192	0.521851
--0.3814077564	0.8332089489	8551/16384	0.521912
--0.3829736136	0.8323588172	1069/2048	0.521973
--0.3832451937	0.831859472	1067/2044	0.522016
--0.3843545695	0.8319495782	8553/16384	0.522034
--0.384334361	0.8342529972	4277/8192	0.522095
--0.3832475647	0.8346785568	1061/2032	0.522146
--0.3831248231	0.8351595702	8555/16384	0.522156
--0.3838301184	0.8366442077	2139/4096	0.522217
--0.3855460278	0.8379494473	8557/16384	0.522278
--0.3876896913	0.8396823126	4279/8192	0.522339
--0.389687916	0.8363504980000001	1003/1920	0.522396
--0.3895786553	0.8367416316	8559/16384	0.5224
--0.3881768923	0.8354310973	535/1024	0.522461
--0.3881768923	0.8354310973	535/1024	0.522461
--0.3882386586	0.8353632446	1069/2046	0.522483
--0.3869352769	0.8355023445	8561/16384	0.522522
--0.3877762462	0.8334901293	4281/8192	0.522583
--0.3896141689	0.8335641917	8563/16384	0.522644
--0.3911485624	0.8332294235	1037/1984	0.522681
--0.3908517191	0.8323449609	2141/4096	0.522705
--0.3923076811	0.8317480214	8565/16384	0.522766
--0.3926751315	0.8323430858999999	803/1536	0.522786
--0.3941661261	0.832379999	4283/8192	0.522827
--0.3963363216	0.8291437325	8567/16384	0.522888
--0.393171081	0.8289540724	1071/2048	0.522949
--0.3926730294	0.8293251601	1069/2044	0.522994
--0.3918404429	0.8293513194	8569/16384	0.52301
--0.39190857	0.8279628246	1067/2040	0.523039
--0.3902812353	0.8253560273	4285/8192	0.523071
--0.3926344571	0.8241806109000001	1063/2032	0.52313
--0.3925399617	0.8242533395	8571/16384	0.523132
--0.3913705267	0.8233556354	2143/4096	0.523193
--0.3907015733	0.8231699312	8573/16384	0.523254
--0.3902919352	0.8231597169	1055/2016	0.523313
--0.3902878103	0.8231597427	4287/8192	0.523315
--0.3904019412	0.8234535997	8575/16384	0.523376
--0.3904237649	0.8233817257	67/128	0.523438
--0.3904237649	0.8233817257	67/128	0.523438
--0.3904280977	0.8233732181	357/682	0.52346
--0.3904056592	0.823494998	8577/16384	0.523499
--0.3901816018	0.8230750338	4289/8192	0.52356
--0.3907812126	0.8231299764	8579/16384	0.523621
--0.3917616069	0.8231070089	2145/4096	0.523682
--0.3918502268	0.823188666	1039/1984	0.52369
--0.3927632615	0.8245424013	8581/16384	0.523743
--0.3890661371	0.8261222617	4291/8192	0.523804
--0.3879505959	0.8236543998	8583/16384	0.523865
--0.3857756351	0.8240337009	1073/2048	0.523926
--0.3850866783	0.8246251704000001	153/292	0.523973
--0.3836557848	0.8241249521	8585/16384	0.523987
--0.3846943556	0.8222167072	1069/2040	0.52402
--0.3856499826	0.8205313084	4293/8192	0.524048
--0.3869970627	0.8208801438	805/1536	0.524089
--0.3875759275	0.8211628253	8587/16384	0.524109
--0.3875223826	0.8210498447	1065/2032	0.524114
--0.3885395722	0.8199511113	2147/4096	0.52417
--0.3897060679	0.8188329668	8589/16384	0.524231
--0.3912061768	0.8183990004	4295/8192	0.524292
--0.3909947621	0.8182027668	151/288	0.524306
--0.3912891354	0.8164078946	8591/16384	0.524353
--0.3898280208	0.8146140463	537/1024	0.524414
--0.3899455724	0.8144453823	1073/2046	0.524438
--0.3883484075	0.8159588935	8593/16384	0.524475
--0.3887755418	0.8160693832	1007/1920	0.524479
--0.3883477182	0.8102714679	4297/8192	0.524536
--0.3930565375	0.8123635765	8595/16384	0.524597
--0.3964824319	0.8134927233	2149/4096	0.524658
--0.3976100119	0.8149239881	1041/1984	0.524698
--0.3968393855	0.8158441982	8597/16384	0.524719
--0.3956972256	0.817177595	4299/8192	0.52478
--0.3960521552	0.8195264611	8599/16384	0.524841
--0.3983665604	0.8185352746	1075/2048	0.524902
--0.3987535296	0.8179008356	1073/2044	0.524951
--0.3994425339	0.8175666932	8601/16384	0.524963
--0.3999230968	0.8192724768	21/40	0.525
--0.4008914507	0.8198469181	4301/8192	0.525024
--0.4006591858	0.8219971653	8603/16384	0.525085
--0.4008536416	0.8226202831	1067/2032	0.525098
--0.402844046	0.8217635516	2151/4096	0.525146
--0.4041888178	0.8208882163	8605/16384	0.525208
--0.4057371905	0.8199138458	4303/8192	0.525269
--0.4065199634	0.8184139934	353/672	0.525298
--0.4071001434	0.8180216456	8607/16384	0.52533
--0.406795902	0.8178343546	269/512	0.525391
--0.406795902	0.8178343546	269/512	0.525391
--0.4067796375	0.8177712794000001	1075/2046	0.525415
--0.4072889742	0.8180919037	8609/16384	0.525452
--0.404272996	0.816570195	4305/8192	0.525513
--0.4042596586	0.8172749853	1009/1920	0.525521
--0.4072343301	0.8159333776	8611/16384	0.525574
--0.4101479737	0.8150659385	2153/4096	0.525635
--0.4117397641	0.8174498536	8613/16384	0.525696
--0.4114719551	0.818106538	1043/1984	0.525706
--0.4103563868	0.8191318966	4307/8192	0.525757
--0.4102432851	0.8212219331	8615/16384	0.525818
--0.4121966976	0.8218697599	1077/2048	0.525879
--0.4130021518	0.8220762094	1075/2044	0.52593
--0.4137779585	0.8225546785	8617/16384	0.52594
--0.4118438177	0.8234074204	1073/2040	0.52598
--0.4116454532	0.8243146548	4309/8192	0.526001
--0.4101397638	0.8238397086	8619/16384	0.526062
--0.4094290036	0.8237316872	1069/2032	0.526083
--0.4093898787	0.8253774237	2155/4096	0.526123
--0.4090391693	0.8271881413	8621/16384	0.526184
--0.4081465503	0.8295820037	4311/8192	0.526245
--0.4100914475	0.8325838169999999	1061/2016	0.52629
--0.4121124952	0.8306150703	8623/16384	0.526306
--0.4131475936	0.8292457975999999	539/1024	0.526367
--0.4131475936	0.8292457976	539/1024	0.526367
--0.4132605133	0.8293512451	359/682	0.526393
--0.4119830754	0.8276421423	8625/16384	0.526428
--0.4151349106	0.8274019638	4313/8192	0.526489
--0.4160761136	0.8299112603	8627/16384	0.52655
--0.4163834884	0.8303841481999999	337/640	0.526563
--0.4187680872	0.8313284083	2157/4096	0.526611
--0.4202589633	0.833531972	8629/16384	0.526672
--0.4193428772	0.8342466772	809/1536	0.526693
--0.4175709225	0.8349130759	1045/1984	0.526714
--0.4195842905	0.8372292093	4315/8192	0.526733
--0.4272681836	0.8407382148	8631/16384	0.526794
--0.4265573452	0.8333669144	1079/2048	0.526855
--0.4256881187	0.8320948378	1077/2044	0.526908
--0.4246608265	0.8313409357	8633/16384	0.526917
--0.4286958745	0.8297672086	215/408	0.526961
--0.4274516184	0.8281090093	4317/8192	0.526978
--0.4313326289	0.825601861	8635/16384	0.527039
--0.430565061	0.8204579923	1071/2032	0.527067
--0.4273966722	0.8220135947	2159/4096	0.5271
--0.4259595273	0.8201121502	8637/16384	0.527161
--0.4253700266	0.8193118517	4319/8192	0.527222
--0.4249746112	0.8198242341999999	1063/2016	0.527282
--0.4249751915	0.8198262644	8639/16384	0.527283
--0.4251321015	0.8197957043	135/256	0.527344
--0.4251321015	0.8197957043	135/256	0.527344
--0.425152852	0.8198215901	1079/2046	0.52737
--0.424860912	0.8198270848	8641/16384	0.527405
--0.4255385743	0.819010977	4321/8192	0.527466
--0.4261582932	0.8203611108	8643/16384	0.527527
--0.4210680085	0.8231102108	2161/4096	0.527588
--0.4218422751	0.8241493113	1013/1920	0.527604
--0.4205525626	0.8203034341	8645/16384	0.527649
--0.4223495512	0.8189389961	4323/8192	0.52771
--0.4220614942	0.8189926645	1047/1984	0.527722
--0.4230219692	0.8170094694	8647/16384	0.527771
--0.4212590578	0.8154363678	1081/2048	0.527832
--0.4202556753	0.8147604541	1079/2044	0.527886
--0.4194692796	0.8140639985	8649/16384	0.527893
--0.4228049664	0.8136397338	359/680	0.527941
--0.4234691786	0.8128844649	4325/8192	0.527954
--0.4242202484	0.8139323617999999	811/1536	0.527995
--0.4245920959	0.8146370223	8651/16384	0.528015
--0.4259435466	0.815226397	1073/2032	0.528051
--0.4264636098	0.8138503769	2163/4096	0.528076
--0.4280644374	0.8129863597	8653/16384	0.528137
--0.4298910325	0.8122963284	4327/8192	0.528198
--0.4290571225	0.8092350377	8655/16384	0.528259
--0.428825145	0.8084360611	355/672	0.528274
--0.4285582194	0.8082858992	541/1024	0.52832
--0.4285582194	0.8082858992	541/1024	0.52832
--0.4286894955	0.8081543602	1081/2046	0.528348
--0.4272735651	0.810050909	8657/16384	0.528381
--0.4270075599	0.8059895596	4329/8192	0.528442
--0.4298190064	0.8060596175	8659/16384	0.528503
--0.4324233485	0.8045500659	2165/4096	0.528564
--0.4347655327	0.8055707205	8661/16384	0.528625
--0.4342517212	0.8064307932	203/384	0.528646
--0.4352868224	0.8082067665	4331/8192	0.528687
--0.4361121768	0.8101076031	1049/1984	0.52873
--0.4391009979	0.8108250732	8663/16384	0.528748
--0.440982854	0.8043888821	1083/2048	0.528809
--0.4397855296	0.8022501624	1081/2044	0.528865
--0.4389730329	0.8017335264	8665/16384	0.52887
--0.4459368934	0.7993780685	1079/2040	0.528922
--0.4453124338	0.797765378	4333/8192	0.528931
--0.4537992512	0.7990451668	8667/16384	0.528992
--0.4519061162	0.7864880395	1075/2032	0.529035
--0.4501854271	0.78883528	2167/4096	0.529053
--0.4445518607	0.7854421433	8669/16384	0.529114
--0.4308984881	0.7684139598	4335/8192	0.529175
--0.4320581184	0.7660301485	8671/16384	0.529236
--0.431580744	0.766164066	1067/2016	0.529266
--0.4316816027	0.7662137447	271/512	0.529297
--0.4316816027	0.7662137447	271/512	0.529297
--0.431480274	0.7661273919	361/682	0.529326
--0.4324367637	0.7657672275	8673/16384	0.529358
--0.4239319094	0.7708717088	4337/8192	0.529419
--0.4297322256	0.7639706719	8675/16384	0.52948
--0.4309401344	0.7599636824	2169/4096	0.529541
--0.4341325827	0.7597884816	8677/16384	0.529602
--0.4358279134	0.7617730938	4339/8192	0.529663
--0.4365604299	0.761771047	339/640	0.529687
--0.438517195	0.7616036916	8679/16384	0.529724
--0.4386291224	0.7610908594	1051/1984	0.529738
--0.4384850094	0.7584112155	1085/2048	0.529785
--0.4382450079	0.757123585	1083/2044	0.529843
--0.4382312315	0.7571055487	8681/16384	0.529846
--0.4408333526	0.757165161	1081/2040	0.529902
--0.4408129442	0.7571201995	4341/8192	0.529907
--0.4423696322	0.7590948862	8683/16384	0.529968
--0.4443909939	0.7561202943999999	1077/2032	0.53002
--0.4442541778	0.7562384995	2171/4096	0.530029
--0.444358791	0.7534564309	8685/16384	0.53009
--0.4433830467	0.7510182819	4343/8192	0.530151
--0.4395865271	0.7536376021	8687/16384	0.530212
--0.4393669285	0.7537755204	1069/2016	0.530258
--0.4393616399	0.7537625288000001	543/1024	0.530273
--0.4393616399	0.7537625289	543/1024	0.530273
--0.4407953733	0.7531639053	8689/16384	0.530334
--0.4387683995	0.754652766	4345/8192	0.530396
--0.4383498549	0.753721478	8691/16384	0.530457
--0.4374313362	0.7537116722	2173/4096	0.530518
--0.4368583347	0.753431245	8693/16384	0.530579
--0.436966791	0.7531208232	815/1536	0.530599
--0.4362037565	0.7528056101	4347/8192	0.53064
--0.4350758579	0.7537825139	8695/16384	0.530701
--0.4363051457	0.7541998235	1019/1920	0.530729
--0.4363839977	0.7542472379	1053/1984	0.530746
--0.4363791971	0.754233675	1087/2048	0.530762
--0.4366617216	0.7542128146	155/292	0.530822
--0.436661169	0.7542132911	8697/16384	0.530823
--0.4366967091	0.754639716	361/680	0.530882
--0.4366967569	0.7546400821	4349/8192	0.530884
--0.4367412786	0.7550437081	8699/16384	0.530945
--0.436982578	0.7547515366999999	1079/2032	0.531004
--0.436982371	0.7547513903	2175/4096	0.531006
--0.4370032751	0.7546211966	8701/16384	0.531067
--0.4369756677	0.7545484142	4351/8192	0.531128
--0.4369382427	0.7545841332	8703/16384	0.531189
--0.4369493534	0.7545832076	17/32	0.53125
--0.4369493534	0.7545832076	17/32	0.53125
--0.4369543287	0.7545875688	1087/2046	0.531281
--0.4369236237	0.7545863018	8705/16384	0.531311
--0.4370074581	0.7545001994	4353/8192	0.531372
--0.4370157859	0.7546562983	8707/16384	0.531433
--0.4370411749	0.7549715287	2177/4096	0.531494
--0.43655564	0.7550085406	8709/16384	0.531555
--0.4365616507	0.7545833081	4355/8192	0.531616
--0.4365386752	0.7542057336	8711/16384	0.531677
--0.4356016248	0.7538091468	1089/2048	0.531738
--0.4356004884	0.7537244856999999	1055/1984	0.531754
--0.4344266407	0.7536630515	8713/16384	0.531799
--0.4367780897	0.7523917319	4357/8192	0.53186
--0.4367933719	0.7523805894	217/408	0.531863
--0.436966791	0.7531208232	817/1536	0.531901
--0.4370788294	0.7534803013	8715/16384	0.531921
--0.4379305758	0.7534697985	2179/4096	0.531982
--0.4379393089	0.7534685563	1081/2032	0.531988
--0.4385872045	0.753795149	8717/16384	0.532043
--0.4390852039	0.754303299	4359/8192	0.532104
--0.4418203126	0.7526154242	8719/16384	0.532166
--0.4423349413	0.7524596864	545/1024	0.532227
--0.4423349413	0.7524596864	545/1024	0.532227
--0.442320591	0.7523846712	1073/2016	0.532242
--0.4425824263	0.7526212781	33/62	0.532258
--0.440213407	0.7531636113	8721/16384	0.532288
--0.444986468	0.7494638758	4361/8192	0.532349
--0.4447088897	0.7543641252	8723/16384	0.53241
--0.4444584879	0.7589163272	2181/4096	0.532471
--0.4415471319	0.7591016169	8725/16384	0.532532
--0.4401400401	0.7577288306	4363/8192	0.532593
--0.4382597377	0.7577125667	8727/16384	0.532654
--0.4380500429	0.7608000049	1091/2048	0.532715
--0.4386291224	0.7610908594	1057/1984	0.532762
--0.4388500451	0.7624066322	8729/16384	0.532776
--0.438775064	0.762338241	1089/2044	0.532779
--0.4365604299	0.761771047	341/640	0.532813
--0.4347997105	0.762472588	4365/8192	0.532837
--0.4349041993	0.7624094037	1087/2040	0.532843
--0.4331461631	0.7598230629	8731/16384	0.532898
--0.4308341181	0.7623546017	2183/4096	0.532959
--0.4297944576	0.764917416	8733/16384	0.53302
--0.4158654739	0.7812193108	4367/8192	0.533081
--0.4111217394	0.7782229829	8735/16384	0.533142
--0.4114457502	0.7790822136	273/512	0.533203
--0.4114457502	0.7790822136	273/512	0.533203
--0.4112285115	0.7795342584	1075/2016	0.533234
--0.4113570877	0.7794367461	1091/2046	0.533236
--0.4105956015	0.7775177584	8737/16384	0.533264
--0.4174246095	0.7890825387	4369/8192	0.533325
--0.4072326054	0.7836297381	8739/16384	0.533386
--0.3969762843	0.7840722491	2185/4096	0.533447
--0.3924628419	0.7716875239	8741/16384	0.533508
--0.402197391	0.7668960165	4371/8192	0.533569
--0.4076063673	0.7605123379	8743/16384	0.53363
--0.4020808594	0.7497043287	1093/2048	0.533691
--0.4017616762	0.7408929818	8745/16384	0.533752
--0.407831679	0.7443462947	1059/1984	0.53377
--0.4132263078	0.7470827385	4373/8192	0.533813
--0.4132882244	0.7462090555999999	363/680	0.533824
--0.4138950134	0.7507678943	205/384	0.533854
--0.414892656	0.7529922007	8747/16384	0.533875
--0.4195988622	0.7506479516	2187/4096	0.533936
--0.4190635899	0.7504402869	1085/2032	0.533957
--0.4230515828	0.749243002	8749/16384	0.533997
--0.4260288107	0.7482685623	4375/8192	0.534058
--0.422198361	0.7396773459	8751/16384	0.534119
--0.4221974021	0.7388393657	547/1024	0.53418
--0.4221974021	0.7388393657	547/1024	0.53418
--0.4224427304	0.7384163348	1093/2046	0.534213
--0.4224679344	0.7392156062	359/672	0.534226
--0.4222835961	0.7415260561	8753/16384	0.534241
--0.4189050259	0.7351855286	4377/8192	0.534302
--0.424573066	0.7351508946	8755/16384	0.534363
--0.4283756716	0.7318959653	2189/4096	0.534424
--0.4318922226	0.7324931383	8757/16384	0.534485
--0.4316183914	0.7341049466	821/1536	0.534505
--0.434881918	0.7350435488	4379/8192	0.534546
--0.4400303064	0.7328472284	8759/16384	0.534607
--0.4346002958	0.7279104066	1095/2048	0.534668
--0.4327276123	0.7277436985	8761/16384	0.534729
--0.4324301392	0.7277630835	1093/2044	0.534736
--0.4344903161	0.7250147653	1061/1984	0.534778
--0.4330331631	0.7241670297	4381/8192	0.53479
--0.4326690618	0.7240625641	1091/2040	0.534804
--0.4345709907	0.7195210008	8763/16384	0.534851
--0.419245011	0.688086244	1027/1920	0.534896
--0.4193416551	0.6878439805	2191/4096	0.534912
--0.4187088446	0.6863612766	1087/2032	0.534941
--0.4211527557	0.6853184245	8765/16384	0.534973
--0.4212665168	0.6837133644	4383/8192	0.535034
--0.4202834683	0.6839726979	8767/16384	0.535095
--0.4204702616	0.6840661256	137/256	0.535156
--0.4204702616	0.6840661256	137/256	0.535156
--0.4206119369	0.6842730133	365/682	0.535191
--0.419870004	0.6838888465	8769/16384	0.535217
--0.419865973	0.6838935988	1079/2016	0.535218
--0.4225773361	0.682614133	4385/8192	0.535278
--0.4211537268	0.6865152631	8771/16384	0.535339
--0.4194217225	0.6972321231	2193/4096	0.5354
--0.4033573977	0.6882636063	8773/16384	0.535461
--0.4117320231	0.6784008504	4387/8192	0.535522
--0.4163637487	0.6723782488	8775/16384	0.535583
--0.4006433619	0.6465849213	1097/2048	0.535645
--0.3855288058	0.6241834581	8777/16384	0.535706
--0.4445977646	0.6443587757	4389/8192	0.535767
--0.4521526516	0.6541376228	1093/2040	0.535784
--0.4462241204	0.6531635913	1063/1984	0.535786
--0.4332986228	0.6654817261	8779/16384	0.535828
--0.4476503769	0.670986729	2195/4096	0.535889
--0.4528684173	0.670348705	1089/2032	0.535925
--0.4499686214	0.6744111914000001	343/640	0.535937
--0.4530998542	0.6782634748	8781/16384	0.53595
--0.4568521811	0.6835731476	4391/8192	0.536011
--0.4895595632	0.6885629701	8783/16384	0.536072
--0.4910129481	0.6896669653	549/1024	0.536133
--0.4910129481	0.6896669653	549/1024	0.536133
--0.4905740428	0.6916389053999999	1097/2046	0.536168
--0.485611298	0.686033285	8785/16384	0.536194
--0.4944081663	0.6793274094	1081/2016	0.53621
--0.5061526874	0.699732669	4393/8192	0.536255
--0.4888845436	0.7012414899	8787/16384	0.536316
--0.4810127408	0.7119905574	2197/4096	0.536377
--0.4733809879	0.7115037828	8789/16384	0.536438
--0.4672057238	0.7076598014	4395/8192	0.536499
--0.4602247015	0.7117390934	8791/16384	0.53656
--0.4679382631	0.7210086079	1099/2048	0.536621
--0.4716213623	0.7219879452	8793/16384	0.536682
--0.4720781127	0.7229543372	1097/2044	0.536693
--0.4677547642	0.7286785392	4397/8192	0.536743
--0.4674746545	0.7295394685	73/136	0.536765
--0.4630966102	0.7275081138	1065/1984	0.536794
--0.4614107911	0.7315699146	8795/16384	0.536804
--0.4681049978	0.7355753176	2199/4096	0.536865
--0.4693211105	0.7354440372	1091/2032	0.536909
--0.4721672369	0.7353230761	8797/16384	0.536926
--0.4901336187	0.7385936981	1031/1920	0.536979
--0.4902206497	0.7384895521	4399/8192	0.536987
--0.4919186875	0.738358519	8799/16384	0.537048
--0.4916469648	0.7381715773999999	275/512	0.537109
--0.4916469648	0.7381715774	275/512	0.537109
--0.4917387299	0.7378949386	1099/2046	0.537146
--0.4922909271	0.7387379434	8801/16384	0.53717
--0.4869851	0.739111664	4401/8192	0.537231
--0.4927205648	0.7352307186	8803/16384	0.537292
--0.5007001381	0.7336717884	2201/4096	0.537354
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--0.4974191848	0.7438121738	4403/8192	0.537476
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--0.4977037657	0.7601866334	1097/2040	0.537745
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--0.4920171363	0.7563601076000001	1067/1984	0.537802
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--0.5115599875	0.7691922829	367/682	0.538123
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--0.5586470407	0.8077866371	1069/1984	0.53881
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--0.55859816	0.8068056768	1095/2032	0.538878
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--0.5580749696	0.8066322803	69/128	0.539062
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--0.558086895	0.8067074302	1103/2046	0.539101
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--0.5586209091	0.8059340055999999	1087/2016	0.539187
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--0.5463796262	0.8005402089	1105/2048	0.539551
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--0.5375689926	0.7995938514000001	1103/2044	0.539628
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--0.531294962	0.8360749345	1091/2016	0.541171
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--0.5227026427	0.848197528	2217/4096	0.54126
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--0.5211210198	0.8401300233	4435/8192	0.541382
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--0.5160160013	0.8343787857	1109/2048	0.541504
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--0.5183101363	0.830563278	13/24	0.541667
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--0.5214962813	0.8231324891	1101/2032	0.541831
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--0.5065005076	0.8242360348	1093/2016	0.542163
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--0.4867565748	0.8152366236	8887/16384	0.542419
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--0.4910898143	0.8465173367	1077/1984	0.542843
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--0.4851548015	0.8541167790999999	1105/2032	0.543799
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--0.4843798142	0.8592604048	1079/1984	0.543851
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--0.4825226725	0.863283849	371/682	0.543988
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--0.4803030748	0.8658058814	8915/16384	0.544128
--0.4791598192	0.8651629901	1097/2016	0.544147
--0.4759315098	0.8652936995	2229/4096	0.544189
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--0.4691641624	0.8886422318	1081/1984	0.544859
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--0.4788801083	0.8935998721	4467/8192	0.545288
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--0.4762311355	0.9181346168	371/680	0.545588
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--0.4890076895	0.9412158900000001	1083/1984	0.545867
--0.488885826	0.9416115349	559/1024	0.545898
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--0.4893530948	0.9420502768	1117/2046	0.545943
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--0.4960232574	0.9400392666	367/672	0.546131
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--0.5007438399	0.9364032193	1049/1920	0.546354
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--0.4995625225	0.9362660473	1117/2044	0.546477
--0.4989925214	0.9352697497	4477/8192	0.546509
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--0.4976194986	0.9360319727	1111/2032	0.546752
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--0.4973191432	0.9360707761	4481/8192	0.546997
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--0.4978710044	0.93411961	1103/2016	0.547123
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--0.5007110169	0.940047234	1121/2048	0.547363
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--0.4791586932	0.9369915344	561/1024	0.547852
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--0.4781195947	0.936958411	1087/1984	0.547883
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--0.473026666	0.9246097663	1105/2016	0.548115
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--0.5072616463	0.9128643377	1123/2048	0.54834
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--0.5136855815	0.9130213897	1121/2044	0.548434
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--0.5174007217	0.9187653292	4493/8192	0.548462
--0.5149126891	0.926023433	8987/16384	0.548523
--0.5154728525	0.9253945151	373/680	0.548529
--0.5280327489	0.927542786	2247/4096	0.548584
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--0.544332024	0.9357979005	1115/2032	0.54872
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--0.5476738879	0.9357967372	8993/16384	0.548889
--0.5477218584	0.9358724666	1089/1984	0.548891
--0.5411214963	0.9371771621	4497/8192	0.54895
--0.5443696976	0.9272542669	8995/16384	0.549011
--0.5679100496	0.9290218578	2249/4096	0.549072
--0.5656885973	0.9426223091	8997/16384	0.549133
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--0.5367041935	0.9557639562	211/384	0.549479
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--0.1228089401	1.1698698709	1129/1984	0.569052
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--0.1084955335	1.1807441333	387/680	0.569118
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--0.0204068697	0.9664320711	4791/8192	0.584839
--0.028278204	0.9451600777	1123/1920	0.584896
--0.0290062664	0.9453979509	9583/16384	0.5849
--0.0239562453	0.947842445	599/1024	0.584961
--0.0239562453	0.947842445	599/1024	0.584961
--0.0270107271	0.9520347999	9585/16384	0.585022
--0.0257862075	0.9538556912	399/682	0.585044
--0.0088991894	0.9466295595	4793/8192	0.585083
--0.0193109264	0.9369161587	1189/2032	0.585138
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--0.0312776806	0.9308800863	1161/1984	0.585181
--0.0306725999	0.9296377038	2397/4096	0.585205
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--0.033273969	0.9260973808	899/1536	0.585286
--0.0436403965	0.9260206186	4795/8192	0.585327
--0.0456081044	0.8980827729	9591/16384	0.585388
--0.0386589764	0.903257435	1199/2048	0.585449
--0.0427736047	0.9084402236	9593/16384	0.58551
--0.0313050109	0.9053667255	4797/8192	0.585571
--0.0298550111	0.904427969	171/292	0.585616
--0.0277802393	0.9021303368	9595/16384	0.585632
--0.0214494878	0.9073936317	2399/4096	0.585693
--0.0234224155	0.909405958	9597/16384	0.585754
--0.023027176	0.9110579041	239/408	0.585784
--0.0258144983	0.912169155	4799/8192	0.585815
--0.0265633899	0.9099798514	9599/16384	0.585876
--0.0259381087	0.9102647475	75/128	0.585938
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--0.0262509057	0.9106979338	9601/16384	0.585999
--0.0260811467	0.9109301574000001	109/186	0.586022
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--0.0248727998	0.9086722933	1191/2032	0.586122
--0.0274270282	0.9064816434	2401/4096	0.586182
--0.0274906957	0.906378302	1163/1984	0.58619
--0.0289072595	0.9051263557	9605/16384	0.586243
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--0.0307992665	0.9176397702	9607/16384	0.586365
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--0.033511002	0.9163375486000001	1051/1792	0.586496
--0.034728202	0.9245585923	4805/8192	0.586548
--0.033273969	0.9260973808	901/1536	0.586589
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--0.0102149566	0.9216311589	399/680	0.586765
--0.000879476	0.9125563487	4807/8192	0.586792
--0.002598219	0.9140129937	169/288	0.586806
-0.008243335	0.9166668342	9615/16384	0.586853
-0.0053103653	0.9182296538	601/1024	0.586914
-0.0053103653	0.9182296538	601/1024	0.586914
-0.004585758	0.9157072855	9617/16384	0.586975
-0.004479729	0.9158590236	1127/1920	0.586979
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--0.0018954512	0.92345627	4809/8192	0.587036
-0.0105538008	0.9272536615	9619/16384	0.587097
-0.0072943434	0.9288914127	1193/2032	0.587106
-0.0215520864	0.9201435037	2405/4096	0.587158
-0.0180031194	0.9242200585	1165/1984	0.587198
-0.0265007464	0.9194661992	9621/16384	0.587219
-0.0191272279	0.9016626474	4811/8192	0.58728
--0.0060250515	0.887586471	9623/16384	0.587341
--0.0023743528	0.876177144	1203/2048	0.587402
-0.0066858624	0.8820474265	9625/16384	0.587463
--0.0075106121	0.8499192839	4813/8192	0.587524
--0.0220243063	0.8511984981	1201/2044	0.587573
--0.028061649	0.8605132744	9627/16384	0.587585
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--0.0575350125	0.8432398416	1199/2040	0.587745
--0.0571150614	0.8383910606	4815/8192	0.587769
--0.053959495	0.838298862	395/672	0.587798
--0.0497747964	0.8377175643	9631/16384	0.58783
--0.0512457403	0.8395061989	301/512	0.587891
--0.0512457403	0.8395061989	301/512	0.587891
--0.0521830085	0.8383471324	9633/16384	0.587952
--0.0532529742	0.8389998886	401/682	0.587977
--0.053278821	0.8431296607	4817/8192	0.588013
--0.0530116417	0.8431158984	1129/1920	0.588021
--0.0480456256	0.8445321766	9635/16384	0.588074
--0.045092433	0.846322083	1195/2032	0.588091
--0.0358875446	0.8425548734	2409/4096	0.588135
--0.0254650154	0.8459063847	9637/16384	0.588196
--0.0283659605	0.8476648955	1167/1984	0.588206
--0.0489217931	0.8171045927	4819/8192	0.588257
--0.0699632391	0.8265055441	9639/16384	0.588318
--0.0735924489	0.8226336837	1205/2048	0.588379
--0.0697101189	0.8201944104	9641/16384	0.58844
--0.0820043638	0.8232573901	4821/8192	0.588501
--0.0815659656	0.8275591757	1203/2044	0.588552
--0.08017214	0.8294328841	9643/16384	0.588562
--0.0814320238	0.8418791493	2411/4096	0.588623
--0.0914833812	0.8471110057	9645/16384	0.588684
--0.0849794222	0.8649334839	1201/2040	0.588725
--0.0942283316	0.8777283262	4823/8192	0.588745
--0.1118234693	0.8825759044	1187/2016	0.58879
--0.1187231543	0.8698791912	9647/16384	0.588806
--0.1120363888	0.8670904664	603/1024	0.588867
--0.1120363888	0.8670904664	603/1024	0.588867
--0.1116917218	0.8723048502	9649/16384	0.588928
--0.1079540241	0.8711269457	1205/2046	0.588954
--0.0993601581	0.8597474163	4825/8192	0.588989
--0.1189204562	0.8476649692	9651/16384	0.58905
--0.1258638978	0.8407927589999999	377/640	0.589063
--0.13187952	0.8540530828	1197/2032	0.589075
--0.141418648	0.8512328557	2413/4096	0.589111
--0.1522572558	0.8491963314	9653/16384	0.589172
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--0.153018272	0.8635626074	1169/1984	0.589214
--0.1627210719	0.8736716375	4827/8192	0.589233
--0.2207932831	0.8655859535	9655/16384	0.589294
--0.2054972941	0.8481183974	1207/2048	0.589355
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--0.2065658667	0.8224140154	1205/2044	0.58953
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--0.1870330769	0.8112306359	2415/4096	0.5896
--0.184142392	0.8163150523	9661/16384	0.589661
--0.1780984811	0.8212346948	401/680	0.589706
--0.1802218205	0.8208273088	4831/8192	0.589722
--0.1840457426	0.8212297218	1189/2016	0.589782
--0.1840334263	0.8212178168	9663/16384	0.589783
--0.183435155	0.8204517897	151/256	0.589844
--0.183435155	0.8204517897	151/256	0.589844
--0.1832088972	0.821009867	9665/16384	0.589905
--0.1828560915	0.8204685006	1207/2046	0.589932
--0.1822572448	0.8188961846	4833/8192	0.589966
--0.184870521	0.8182913136	9667/16384	0.590027
--0.1882006507	0.8205985226	1199/2032	0.590059
--0.1897174438	0.8192489689	2417/4096	0.590088
--0.1896975007	0.8197136073	1133/1920	0.590104
--0.1950072959	0.8203359952	9669/16384	0.590149
--0.1877406365	0.8284254514	4835/8192	0.59021
--0.1876297746	0.8276365435	1171/1984	0.590222
--0.1742192769	0.8352625664	9671/16384	0.590271
--0.1750675563	0.8428356153	1209/2048	0.590332
--0.1794828369	0.8381641563	9673/16384	0.590393
--0.1625666601	0.8554826603	4837/8192	0.590454
--0.1552265439	0.8524042025	907/1536	0.590495
--0.1605951759	0.8453316636	1207/2044	0.590509
--0.157190357	0.8421555713	9675/16384	0.590515
--0.1567353908	0.8053160921	2419/4096	0.590576
--0.1612537983	0.795058529	9677/16384	0.590637
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--0.1724076128	0.7900638245	4839/8192	0.590698
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--0.1690156745	0.7865283007	9681/16384	0.590881
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--0.1667805893	0.7789726507	1201/2032	0.591043
--0.1664334801	0.7785443024	2421/4096	0.591064
--0.1673978647	0.7759628414	9685/16384	0.591125
--0.168709003	0.7757032247	227/384	0.591146
--0.172996491	0.7782220028	4843/8192	0.591187
--0.1779012902	0.7768986054	1173/1984	0.59123
--0.187373601	0.7768395079	9687/16384	0.591248
--0.183312315	0.7685076236	1211/2048	0.591309
--0.181708574	0.773018212	9689/16384	0.59137
--0.174803375	0.7577034577	4845/8192	0.591431
--0.1833631998	0.7438810825	1209/2044	0.591487
--0.1809939877	0.7467068581	9691/16384	0.591492
--0.1661403544	0.7362842981	2423/4096	0.591553
--0.1626584265	0.7432626206	9693/16384	0.591614
--0.1584555533	0.7485091935	71/120	0.591667
--0.1580991893	0.7482332551	4847/8192	0.591675
--0.1618077634	0.7488799057	9695/16384	0.591736
--0.1615120292	0.7477657858	1193/2016	0.591766
--0.1613418194	0.7480024991999999	303/512	0.591797
--0.1613418194	0.7480024992	303/512	0.591797
--0.1610470267	0.7483971062	9697/16384	0.591858
--0.1606706782	0.7477141212	1211/2046	0.591887
--0.1605256414	0.7465190316	4849/8192	0.591919
--0.1630142595	0.7461583472	9699/16384	0.59198
--0.1679679762	0.748291391	1203/2032	0.592028
--0.1674202868	0.7476220043	2425/4096	0.592041
--0.1664656517	0.7473331027	1061/1792	0.592076
--0.1726991583	0.7480856878	9701/16384	0.592102
--0.1606778032	0.7606492773	4851/8192	0.592163
--0.1562272007	0.7601124817	379/640	0.592187
--0.1538968123	0.7554351154	9703/16384	0.592224
--0.1535723438	0.7563444281	1175/1984	0.592238
--0.1533918307	0.7571742311	1213/2048	0.592285
--0.1544789097	0.757060477	9705/16384	0.592346
--0.1512006301	0.7586284448	4853/8192	0.592407
--0.1502217534	0.7566554454	173/292	0.592466
--0.150289597	0.7567190953	9707/16384	0.592468
--0.1461878756	0.7547299553	2427/4096	0.592529
--0.143981338	0.7584662738	9709/16384	0.59259
--0.1384000762	0.7639100928	403/680	0.592647
--0.1382311279	0.7642830181	4855/8192	0.592651
--0.1432366851	0.7649239647	9711/16384	0.592712
--0.1425694707	0.7639597688	1195/2016	0.592758
--0.1426741201	0.7639790846	607/1024	0.592773
--0.1426741201	0.7639790846	607/1024	0.592773
--0.1422950445	0.7644746674	9713/16384	0.592834
--0.1417767105	0.7636987588	1213/2046	0.592864
--0.1417933405	0.7619812721	4857/8192	0.592896
--0.1464378047	0.7617667848	9715/16384	0.592957
--0.1464933136	0.7649105188999999	1205/2032	0.593012
--0.1464818399	0.7649308678	2429/4096	0.593018
--0.14719936	0.7653232652	9717/16384	0.593079
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--0.1469095676	0.7672606484	4859/8192	0.59314
--0.1505101334	0.7678719951	9719/16384	0.593201
--0.1499484994	0.7665548217	1139/1920	0.593229
--0.1497314724	0.7667945893	1177/1984	0.593246
--0.1498274912	0.7668123294	1215/2048	0.593262
--0.1494524624	0.7673307282	9721/16384	0.593323
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--0.1501181627	0.7652983065	1213/2044	0.593444
--0.150114756	0.7652969423	9723/16384	0.593445
--0.1496340108	0.7645849863	2431/4096	0.593506
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--0.1490598374	0.7649191677	1211/2040	0.593627
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--0.1492243664	0.7650301145	9727/16384	0.593689
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--0.149196022	0.7649924216	9729/16384	0.593811
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--0.1495000696	0.7650971784	2433/4096	0.593994
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--0.1484326765	0.765674306	1179/1984	0.594254
--0.1484221866	0.7656021552	1141/1920	0.594271
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--0.1477669791	0.7652727186	1215/2044	0.594423
--0.1479529632	0.7642625313	2435/4096	0.594482
--0.147585764	0.7633492392	9741/16384	0.594543
--0.1490609007	0.7624122944	4871/8192	0.594604
--0.1490530282	0.7623986335	1213/2040	0.594608
--0.1485680365	0.7613521492	9743/16384	0.594666
--0.1483699035	0.7616894563	609/1024	0.594727
--0.1483582956	0.7617036798	1199/2016	0.594742
--0.1485674284	0.7616971907	9745/16384	0.594788
--0.148204349	0.7623381756	4873/8192	0.594849
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--0.1483243484	0.7590159484	2437/4096	0.594971
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--0.1504615165	0.7603214826	4875/8192	0.595093
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--0.1527564511	0.762276525	1181/1984	0.595262
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--0.1562272007	0.7601124817	381/640	0.595313
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--0.1554914163	0.7649737174	9755/16384	0.595398
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--0.161196235	0.7675128816	4879/8192	0.595581
--0.1613276067	0.767498153	81/136	0.595588
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--0.160345019	0.7665203205	305/512	0.595703
--0.160345019	0.7665203205	305/512	0.595703
--0.1603094056	0.7664711051999999	1201/2016	0.595734
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--0.1678749278	0.7669918501	1183/1984	0.59627
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--0.1669860771	0.7737579502	9771/16384	0.596375
--0.1670434247	0.7734641383	1219/2044	0.59638
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--0.1601294375	0.7781941687	9773/16384	0.596497
--0.152754783	0.7763527965	4887/8192	0.596558
--0.1527987228	0.7759959211	1217/2040	0.596569
--0.1511585835	0.7822462731	9775/16384	0.596619
--0.152904896	0.7813579647	611/1024	0.59668
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--0.1524589297	0.7814310412	401/672	0.596726
--0.1520624232	0.7807422201	9777/16384	0.596741
--0.1531647589	0.7800606567	37/62	0.596774
--0.1554485064	0.7793074984	4889/8192	0.596802
--0.1586237525	0.7879943034	9779/16384	0.596863
--0.1485192583	0.7922367012	2445/4096	0.596924
--0.1493548944	0.7913480978	1213/2032	0.596949
--0.144123362	0.7946967628	9781/16384	0.596985
--0.1397959827	0.7860365864	4891/8192	0.597046
--0.1250027207	0.7814242852	9783/16384	0.597107
--0.1256215513	0.7877307567	1223/2048	0.597168
--0.1242036096	0.7942760754	1185/1984	0.597278
--0.1244240453	0.7947979303	4893/8192	0.59729
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--0.1204688047	0.7955493629	1221/2044	0.597358
--0.1202111035	0.8037681087	1147/1920	0.597396
--0.1195425576	0.8032821615	2447/4096	0.597412
--0.1227638753	0.8030211822	9789/16384	0.597473
--0.1264143296	0.8031267207	4895/8192	0.597534
--0.1262753744	0.8038618776999999	1219/2040	0.597549
--0.1251870974	0.8013221245	9791/16384	0.597595
--0.1250285075	0.8018612052	153/256	0.597656
--0.1250285075	0.8018612052	153/256	0.597656
--0.1253660487	0.8018352495	9793/16384	0.597717
--0.1253646241	0.8018334179	1205/2016	0.597718
--0.1252976466	0.8022173241	1223/2046	0.597752
--0.1245900558	0.8028690906	4897/8192	0.597778
--0.1235642313	0.8017808258	9795/16384	0.597839
--0.1229713365	0.7993656662	2449/4096	0.5979
--0.122988824	0.8000500586	1215/2032	0.597933
--0.1222320105	0.7974296767	9797/16384	0.597961
--0.1268435695	0.7978412871	4899/8192	0.598022
--0.1332108224	0.7994933122	9799/16384	0.598083
--0.132125415	0.7970324012	9801/16384	0.598206
--0.1389903862	0.7927794818	4901/8192	0.598267
--0.1373442069	0.7926672749	1187/1984	0.598286
--0.1423045922	0.7934980598	919/1536	0.598307
--0.1414002918	0.7982968016	9803/16384	0.598328
--0.1409500842	0.797446713	1223/2044	0.598337
--0.1341441041	0.8255770919	2451/4096	0.598389
--0.1258638978	0.8407927589999999	383/640	0.598437
--0.1198911101	0.8330001265	9805/16384	0.59845
--0.1057366536	0.8201900521	4903/8192	0.598511
--0.1094840054	0.8200054822	407/680	0.598529
--0.0990902735	0.8260124391	9807/16384	0.598572
--0.1017152153	0.8269376287	613/1024	0.598633
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--0.1015940804	0.8251391925	9809/16384	0.598694
--0.1018753877	0.8241801088	1207/2016	0.59871
--0.1032810401	0.825142362	1225/2046	0.598729
--0.1083536541	0.8281629085	4905/8192	0.598755
--0.1071521195	0.8274806407	1073/1792	0.598772
--0.0973632927	0.8366340156	9811/16384	0.598816
--0.0883573201	0.8294524462	2453/4096	0.598877
--0.0913230201	0.8328994936	1217/2032	0.598917
--0.0844031041	0.8276421831	9813/16384	0.598938
--0.088975316	0.8182887355	4907/8192	0.598999
--0.0963353555	0.8004415339	9815/16384	0.59906
--0.087274477	0.7957909696	1227/2048	0.599121
--0.0873057709	0.8030691903	9817/16384	0.599182
--0.0723175503	0.7762667146	4909/8192	0.599243
--0.0859406778	0.7701993046	1189/1984	0.599294
--0.0935435961	0.7694367304	9819/16384	0.599304
--0.0899216861	0.7662545428	175/292	0.599315
--0.1072964158	0.7516267225	2455/4096	0.599365
--0.1010695016	0.743120131	9821/16384	0.599426
--0.09707460330000001	0.7289645581999999	1151/1920	0.599479
--0.0981624623	0.728854847	4911/8192	0.599487
--0.09807756550000001	0.7317951137000001	1223/2040	0.59951
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--0.0934975589	0.7340625148	9825/16384	0.59967
--0.09521569940000001	0.7346151986	403/672	0.599702
--0.0955880314	0.7340889464	409/682	0.599707
--0.0973983505	0.7365680672	4913/8192	0.599731
--0.0944145901	0.7413117203	9827/16384	0.599792
--0.0861603619	0.748155475	2457/4096	0.599854
--0.0881474136	0.7467088565	1075/1792	0.599888
--0.0905808463	0.7503420619	1219/2032	0.599902
--0.0834404402	0.7580851087	9829/16384	0.599915
--0.0689069008	0.7237294813	4915/8192	0.599976
--0.0950967683	0.7031035182	9831/16384	0.600037
--0.0934575371	0.6940847307	1229/2048	0.600098
--0.0881336408	0.6957696087	9833/16384	0.600159
--0.1039455918	0.6823427793	4917/8192	0.60022
--0.1095339803	0.6933594917	9835/16384	0.600281
--0.1138881055	0.6934956713	1227/2044	0.600294
--0.1136867442	0.6988556142	1191/1984	0.600302
--0.1228695128	0.7024516352	2459/4096	0.600342
--0.1317155849	0.6945109478	9837/16384	0.600403
--0.1511431559	0.6927939344	4919/8192	0.600464
--0.1478441728	0.6889328384	245/408	0.60049
--0.143882785	0.6837173616	1153/1920	0.600521
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--0.1434260734	0.6860642591	615/1024	0.600586
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--0.1445524621	0.6860347228	9841/16384	0.600647
--0.143855208	0.6885224018	1229/2046	0.600684
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--0.1375549488	0.6768137929	2461/4096	0.60083
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--0.1335818698	0.6680534245	1213/2016	0.601687
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--0.1339701066	0.6673267806	2465/4096	0.601807
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--0.1340466638	0.666717593	1223/2032	0.60187
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--0.1184814775	0.686777058	1225/2032	0.602854
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--0.1228858073	0.6619716406	9879/16384	0.602966
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--0.1408797271	0.6363494474	1197/1984	0.603327
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--0.1663939549	0.6469663507	1219/2016	0.604663
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--0.2178352792	0.6256028405	1203/1984	0.606351
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--0.2165717484	0.6231181802	1087/1792	0.606585
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--0.2135160817	0.6130332507	1223/2016	0.606647
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--0.2448985426	0.6393549371	9943/16384	0.606873
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--0.2451337715	0.5920363705	9959/16384	0.607849
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--0.2297251149	0.5832742076	9969/16384	0.608459
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--0.2315278286	0.5826215945	9971/16384	0.608582
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--0.2325686074	0.5911745181	9975/16384	0.608826
--0.2329738907	0.5901238465	1169/1920	0.608854
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--0.2325833976	0.5902838509	9977/16384	0.608948
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--0.2336592879	0.5889402575	1243/2040	0.609314
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--0.2336690709	0.588928856	9985/16384	0.609436
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--0.2336870787	0.5889168928	4993/8192	0.609497
--0.2337021283	0.5889470703	9987/16384	0.609558
--0.2337045437	0.5890125073	2497/4096	0.609619
--0.2337045588	0.5890124025	1229/2016	0.609623
--0.2338212044	0.5891236254	9989/16384	0.60968
--0.2335530956	0.5890209762	4995/8192	0.609741
--0.2335529766	0.5890212452	1239/2032	0.609744
--0.2333775506	0.5888378624	9991/16384	0.609802
--0.2332790768	0.5889140189	1249/2048	0.609863
--0.2332776142	0.5889045255000001	1171/1920	0.609896
--0.2333178905	0.5889200562	9993/16384	0.609924
--0.233314682	0.5889193455	1093/1792	0.609933
--0.2326179661	0.589194808	4997/8192	0.609985
--0.2326059147	0.5883153441	937/1536	0.610026
--0.2330727891	0.58858475	9995/16384	0.610046
--0.233527523	0.5884824369	1247/2044	0.610078
--0.2335130456	0.5882766791	2499/4096	0.610107
--0.2336183658	0.5875565567	9997/16384	0.610168
--0.2345735537	0.587872932	4999/8192	0.610229
--0.2345581396	0.5872148825	9999/16384	0.610291
--0.2344282385	0.5873359851	625/1024	0.610352
--0.2344282385	0.5873359851	625/1024	0.610352
--0.2344261239	0.587326748	1211/1984	0.610383
--0.2344694729	0.5873447522	10001/16384	0.610413
--0.2343260179	0.5874343261	1249/2046	0.610459
--0.2343381914	0.5874847307	5001/8192	0.610474
--0.2340952816	0.5873001685	10003/16384	0.610535
--0.2343147852	0.584044854	2501/4096	0.610596
--0.2344634395	0.5842297228	1231/2016	0.610615
--0.2383083425	0.5825250657	10005/16384	0.610657
--0.2361513908	0.5870327185	5003/8192	0.610718
--0.2360867897	0.5870455528	1241/2032	0.610728
--0.235788992	0.5891091144	10007/16384	0.610779
--0.2366766075	0.5894163207	1251/2048	0.61084
--0.2365465244	0.5891578975	10009/16384	0.610901
--0.2369523222	0.5889234117	391/640	0.610938
--0.2394709337	0.591213234	5005/8192	0.610962
--0.236895162	0.5920880846	10011/16384	0.611023
--0.2352043003	0.5944010648	1249/2044	0.611057
--0.2364315899	0.5945963586	2503/4096	0.611084
--0.2381336992	0.594726801	10013/16384	0.611145
--0.2392532571	0.5958030807	5007/8192	0.611206
--0.2390920326	0.594869534	10015/16384	0.611267
--0.2391183716	0.5948593428	1247/2040	0.611275
--0.2389752988	0.5950026483999999	313/512	0.611328
--0.2389752988	0.5950026484	313/512	0.611328
--0.2390213425	0.5950095462	10017/16384	0.611389
--0.2390215701	0.5950094025	1213/1984	0.611391
--0.2388585762	0.5951020896	417/682	0.611437
--0.2388594264	0.5951731769	5009/8192	0.61145
--0.238654286	0.5949014885	10019/16384	0.611511
--0.2384852706	0.5943299948	2505/4096	0.611572
--0.2385244501	0.594389056	137/224	0.611607
--0.2374841396	0.5937548962	10021/16384	0.611633
--0.2397288945	0.5935978087	5011/8192	0.611694
--0.2396045868	0.5936696871	1243/2032	0.611713
--0.2490885336	0.5977663803	10023/16384	0.611755
--0.2517717716	0.6035885902	1253/2048	0.611816
--0.25256306	0.602024019	10025/16384	0.611877
--0.2458411303	0.6173473468	5013/8192	0.611938
--0.2385343847	0.6122461047	235/384	0.611979
--0.2423661445	0.6074067445	10027/16384	0.612
--0.2391541726	0.6013023008	1251/2044	0.612035
--0.2366673453	0.6027282475	2507/4096	0.612061
--0.2308200924	0.6044930649	10029/16384	0.612122
--0.2290790915	0.5972902065	5015/8192	0.612183
--0.2248895908	0.6000576658	10031/16384	0.612244
--0.2251131246	0.5997605787	1249/2040	0.612255
--0.2261934557	0.6003449349	627/1024	0.612305
--0.2261934557	0.6003449349	627/1024	0.612305
--0.2260763218	0.6000258654	10033/16384	0.612366
--0.2266132184	0.6000146711	1215/1984	0.612399
--0.2272277203	0.6005281446	1253/2046	0.612414
--0.2275574281	0.600324869	5017/8192	0.612427
--0.2273144504	0.6026621629	10035/16384	0.612488
--0.2158671735	0.6085390695	2509/4096	0.612549
--0.2135160817	0.6130332507	1235/2016	0.612599
--0.2085885109	0.6070089904	10037/16384	0.61261
--0.2085835548	0.6020343163	941/1536	0.61263
--0.2148048571	0.5961851137	5019/8192	0.612671
--0.2117295591	0.5963640101	1245/2032	0.612697
--0.2097126675	0.5841287736	10039/16384	0.612732
--0.2061395037	0.5871832768	1255/2048	0.612793
--0.2073724005	0.5875678719	10041/16384	0.612854
--0.1979015773	0.5894119133	5021/8192	0.612915
--0.1993737388	0.5846542423	10043/16384	0.612976
--0.1962813859	0.5835236561	179/292	0.613014
--0.1960704956	0.584030417	1177/1920	0.613021
--0.1962430899	0.5838903915	2511/4096	0.613037
--0.1962075633	0.5852604758	10045/16384	0.613098
--0.1952308791	0.5858129564	5023/8192	0.613159
--0.1957546582	0.5859228079	10047/16384	0.61322
--0.1957126196	0.5858565217	417/680	0.613235
--0.195715711	0.585817	157/256	0.613281
--0.195715711	0.585817	157/256	0.613281
--0.1956939465	0.585837129	10049/16384	0.613342
--0.1956759475	0.5857099379	1255/2046	0.613392
--0.1956645599	0.5856988535	5025/8192	0.613403
--0.1956640843	0.5856983228	1217/1984	0.613407
--0.1958777306	0.5856680901	10051/16384	0.613464
--0.1962853762	0.585760207	2513/4096	0.613525
--0.1968022551	0.5851562375	10053/16384	0.613586
--0.1967974384	0.5852322894	1237/2016	0.613591
--0.1961063432	0.5867639695	5027/8192	0.613647
--0.1964270618	0.5877862695	1247/2032	0.613681
--0.1945086078	0.5874809955	10055/16384	0.613708
--0.1946354668	0.5883426354	1257/2048	0.61377
--0.1948625029	0.5881453152	10057/16384	0.613831
--0.1926322615	0.5926909662	5029/8192	0.613892
--0.1899928116	0.5890384501	943/1536	0.613932
--0.1923292894	0.588132387	10059/16384	0.613953
--0.1922772383	0.5857716942	1255/2044	0.613992
--0.1920063202	0.5855483702	2515/4096	0.614014
--0.191617221	0.586023334	393/640	0.614062
--0.1895002199	0.5850136502	10061/16384	0.614075
--0.1913845674	0.5802200033	5031/8192	0.614136
--0.1890520943	0.5777290694	10063/16384	0.614197
--0.1885201977	0.5782290868	1253/2040	0.614216
--0.188344226	0.5782733347	629/1024	0.614258
--0.188344226	0.5782733347	629/1024	0.614258
--0.1885677158	0.5784325199	10065/16384	0.614319
--0.1872288751	0.5784825852	419/682	0.61437
--0.1871663816	0.5784950997	5033/8192	0.61438
--0.1872471498	0.5785418288	1101/1792	0.614397
--0.1859671199	0.5792172871	1219/1984	0.614415
--0.1873312765	0.5771763618	10067/16384	0.614441
--0.1873756413	0.5738373286	2517/4096	0.614502
--0.1881165852	0.5713453896	10069/16384	0.614563
--0.1906880235	0.5716341539000001	59/96	0.614583
--0.1918388893	0.5749546878	5035/8192	0.614624
--0.1946596452	0.5744158254	1249/2032	0.614665
--0.1965776262	0.5767691964	10071/16384	0.614685
--0.1970847856	0.5743430596	1259/2048	0.614746
--0.196481006	0.5746290273	10073/16384	0.614807
--0.1961571029	0.5682050747	5037/8192	0.614868
--0.2025012588	0.5708665371	10075/16384	0.614929
--0.2112076852	0.5657216918	1257/2044	0.614971
--0.208521719	0.5656672793	2519/4096	0.61499
--0.2033611788	0.5635332842	10077/16384	0.615051
--0.201244449	0.5602020226	1181/1920	0.615104
--0.2013305445	0.5599964701	5039/8192	0.615112
--0.2014065961	0.5620074522	10079/16384	0.615173
--0.201688479	0.5619628986	251/408	0.615196
--0.2017346255	0.5618187482	315/512	0.615234
--0.2017346255	0.5618187482	315/512	0.615234
--0.2016635382	0.561763163	10081/16384	0.615295
--0.2021168537	0.5616513586	1259/2046	0.615347
--0.202087642	0.5615938767	5041/8192	0.615356
--0.2022855015	0.5622793107	10083/16384	0.615417
--0.2022769612	0.5622574452	1221/1984	0.615423
--0.2021171683	0.5635618376	2521/4096	0.615479
--0.2021260341	0.5634258025	1103/1792	0.615513
--0.2043047515	0.5653876498	10085/16384	0.61554
--0.2013242731	0.5648560548	1241/2016	0.615575
--0.1993168306	0.5636824118	5043/8192	0.615601
--0.1964983755	0.5626111179	1251/2032	0.61565
--0.1946024025	0.5609073892	10087/16384	0.615662
--0.1889993708	0.5628319507	1261/2048	0.615723
--0.1883243699	0.5633312555	10089/16384	0.615784
--0.1847870719	0.5597577008	5045/8192	0.615845
--0.1892668315	0.556953427	10091/16384	0.615906
--0.1914489854	0.5481362306999999	1259/2044	0.615949
--0.190967267	0.5502690365	2523/4096	0.615967
--0.183567901	0.5519810326	10093/16384	0.616028
--0.1754515006	0.5441782555	5047/8192	0.616089
--0.1774473683	0.5505321287	1183/1920	0.616146
--0.1773250451	0.5505691768	10095/16384	0.61615
--0.1783629184	0.5497534883	419/680	0.616176
--0.1779926391	0.5496490798	631/1024	0.616211
--0.1779926391	0.5496490798	631/1024	0.616211
--0.1777535069	0.5495442512	10097/16384	0.616272
--0.1789204507	0.5487184186	1261/2046	0.616325
--0.1787619963	0.5487810331	5049/8192	0.616333
--0.1798272835	0.550274526	10099/16384	0.616394
--0.1801583482	0.5531168989	1223/1984	0.616431
--0.1814168428	0.5554829092	2525/4096	0.616455
--0.180496884	0.5567154556	10101/16384	0.616516
--0.1794807394	0.5567566044	947/1536	0.616536
--0.176501109	0.5562372021	1243/2016	0.616567
--0.1772247312	0.5564484861	5051/8192	0.616577
--0.1787803421	0.5598255009999999	1253/2032	0.616634
--0.1785951064	0.5599280978	10103/16384	0.616638
--0.1790260158	0.5589522078	1263/2048	0.616699
--0.17879802	0.5589333385	10105/16384	0.61676
--0.1797115139	0.5577821657	5053/8192	0.616821
--0.1802072695	0.5585277185	10107/16384	0.616882
--0.1806002567	0.5580110312	1261/2044	0.616928
--0.1806081504	0.5580554172	2527/4096	0.616943
--0.180328349	0.557973454	10109/16384	0.617004
--0.1803310362	0.5577678686	5055/8192	0.617065
--0.1802868436	0.5578448469	10111/16384	0.617126
--0.1803058949	0.5578494279	1259/2040	0.617157
--0.1803049286	0.5578455534	79/128	0.617188
--0.1803049286	0.5578455534	79/128	0.617188
--0.180303863	0.5578413805	10113/16384	0.617249
--0.1803259049	0.5578470883	421/682	0.617302
--0.1803244179	0.5578462065	5057/8192	0.61731
--0.180315522	0.5578780388	10115/16384	0.617371
--0.1802775107	0.5579295658	2529/4096	0.617432
--0.1802774391	0.5579299548	1225/1984	0.61744
--0.1803927109	0.5580273113	10117/16384	0.617493
--0.1801497765	0.557850514	5059/8192	0.617554
--0.1801501413	0.5578493721	415/672	0.61756
--0.1800930429	0.5576044615	10119/16384	0.617615
--0.1800947219	0.5576028861	1255/2032	0.617618
--0.1799728881	0.5576171353	1265/2048	0.617676
--0.179992068	0.5576460739	10121/16384	0.617737
--0.1799913561	0.5576435737	1107/1792	0.617746
--0.1793960639	0.5580136919	5061/8192	0.617798
--0.1794807394	0.5567566044	949/1536	0.617839
--0.1799485966	0.5572633182	10123/16384	0.617859
--0.1805539228	0.557168446	1263/2044	0.617906
--0.1804888192	0.5571679699	2531/4096	0.61792
--0.180677103	0.5562814257	10125/16384	0.617981
--0.1816028443	0.5572619904	5063/8192	0.618042
--0.1818675415	0.55672871	10127/16384	0.618103
--0.1816997462	0.5567173531	1261/2040	0.618137
--0.1817141866	0.5567503489	633/1024	0.618164
--0.1817141866	0.5567503489	633/1024	0.618164
--0.1817301274	0.556781036	10129/16384	0.618225
--0.1817294816	0.5567812269	1187/1920	0.618229
--0.1815566267	0.5567859481	115/186	0.61828
--0.1815697124	0.5567894178	5065/8192	0.618286
--0.1815229699	0.55652449	10131/16384	0.618347
--0.1810950906	0.5535157437	2533/4096	0.618408
--0.1801583482	0.5531168989	1227/1984	0.618448
--0.1865151286	0.5515587184	10133/16384	0.618469
--0.1831684055	0.5571256891	5067/8192	0.61853
--0.1833002265	0.556926555	1247/2016	0.618552
--0.1822300653	0.5588235291	10135/16384	0.618591
--0.1823373344	0.5587830368	1257/2032	0.618602
--0.1829218956	0.5593878821	1267/2048	0.618652
--0.1829585046	0.5591409782	10137/16384	0.618713
--0.1859397217	0.5608589601	5069/8192	0.618774
--0.1824098476	0.5617315102	10139/16384	0.618835
--0.1812518059	0.5640396956	1265/2044	0.618885
--0.1812723585	0.5639117205	2535/4096	0.618896
--0.1829616447	0.5643654423	10141/16384	0.618958
--0.1821348456	0.5669424672	5071/8192	0.619019
--0.1828380202	0.5677268968	10143/16384	0.61908
--0.1830032945	0.5676280929	421/680	0.619118
--0.1830001923	0.5676096074	317/512	0.619141
--0.1830001923	0.5676096074	317/512	0.619141
--0.1829565134	0.5675748963	10145/16384	0.619202
--0.1832617824	0.5675042336	1267/2046	0.619257
--0.18325522	0.5674955242	5073/8192	0.619263
--0.1832558024	0.5675021714	1189/1920	0.619271
--0.1832399101	0.5678920616	10147/16384	0.619324
--0.1830789138	0.5683159611	2537/4096	0.619385
--0.1834952889	0.5687033812	10149/16384	0.619446
--0.1837145156	0.5687208868	1229/1984	0.619456
--0.1823200273	0.5684509732	5075/8192	0.619507
--0.1819983422	0.569238926	1249/2016	0.619544
--0.1810353195	0.5685035218	10151/16384	0.619568
--0.1811178609	0.5690575803	1259/2032	0.619587
--0.1808068373	0.5695893606	1269/2048	0.619629
--0.180693306	0.5698286874	10153/16384	0.61969
--0.179705206	0.5699478948	5077/8192	0.619751
--0.1796871984	0.5686850333	10155/16384	0.619812
--0.1791183369	0.5673343028	181/292	0.619863
--0.1791559551	0.567373712	2539/4096	0.619873
--0.177934368	0.5683211724	10157/16384	0.619934
--0.1760956377	0.5652397592	5079/8192	0.619995
--0.1752375964	0.5674374502	10159/16384	0.620056
--0.1757197519	0.5672147024999999	253/408	0.620098
--0.1756768669	0.5672103031	635/1024	0.620117
--0.1756768669	0.5672103031	635/1024	0.620117
--0.1756005532	0.5671211616	10161/16384	0.620178
--0.1761277308	0.5670125304	423/682	0.620235
--0.1761143464	0.5670213588	5081/8192	0.620239
--0.1763057353	0.5677259351	10163/16384	0.6203
--0.1764332286	0.5676759674	397/640	0.620313
--0.1771356452	0.5698411641	2541/4096	0.620361
--0.1766394825	0.5712679416	10165/16384	0.620422
--0.1755633613	0.5714427709	953/1536	0.620443
--0.1747008423	0.5704218796	1231/1984	0.620464
--0.1736636059	0.5707467869	5083/8192	0.620483
--0.1736457394	0.5750695346	10167/16384	0.620544
--0.1751553431	0.573914944	1261/2032	0.620571
--0.1747078264	0.5739029069	1271/2048	0.620605
--0.1743875539	0.573788206	10169/16384	0.620667
--0.1755729184	0.5725236297	5085/8192	0.620728
--0.1763867358	0.5734560429	10171/16384	0.620789
--0.1767892572	0.5728281451	1269/2044	0.620841
--0.1767979413	0.5728209606	2543/4096	0.62085
--0.1764770122	0.5728037441	10173/16384	0.620911
--0.1764483998	0.5725222389	5087/8192	0.620972
--0.1764023425	0.5726169708	10175/16384	0.621033
--0.176425471	0.5726153103	1267/2040	0.621078
--0.1764245414	0.5726159888	159/256	0.621094
--0.1764245414	0.5726159888	159/256	0.621094
--0.1764226584	0.5726106315	10177/16384	0.621155
--0.176449471	0.5726143041	41/66	0.621212
--0.1764494231	0.5726147994	5089/8192	0.621216
--0.1764411854	0.5726556501	10179/16384	0.621277
--0.1763978836	0.5727232436	2545/4096	0.621338
--0.1763956558	0.5727221882	1193/1920	0.621354
--0.1765223757	0.5727857297	10181/16384	0.621399
--0.1762351129	0.5726328755	5091/8192	0.62146
--0.1762410691	0.5726362902	1233/1984	0.621472
--0.176163728	0.5723413424	10183/16384	0.621521
--0.176169315	0.5723521841	179/288	0.621528
--0.1760077492	0.5723090867	1263/2032	0.621555
--0.1760225746	0.5723547277	1273/2048	0.621582
--0.1760462645	0.5723919609	10185/16384	0.621643
--0.1755441505	0.5727710938	5093/8192	0.621704
--0.1755633613	0.5714427709	955/1536	0.621745
--0.1760129615	0.5719523568	10187/16384	0.621765
--0.176586721	0.5718329277	1271/2044	0.62182
--0.1765888811	0.5718464053	2547/4096	0.621826
--0.1765414888	0.5710878595	10189/16384	0.621887
--0.1777677899	0.5719263792	5095/8192	0.621948
--0.1783150413	0.5715529577	10191/16384	0.622009
--0.1783166053	0.571123699	423/680	0.622059
--0.1783063194	0.5711171995	637/1024	0.62207
--0.1783063194	0.5711171995	637/1024	0.62207
--0.1783439836	0.5710247562	10193/16384	0.622131
--0.1785632777	0.5711254157	1273/2046	0.62219
--0.1785625283	0.5711260803	5097/8192	0.622192
--0.1785508721	0.571123055	1115/1792	0.62221
--0.1786442813	0.5713280469	10195/16384	0.622253
--0.1790112993	0.5715663048	2549/4096	0.622314
--0.1791786829	0.5718040295	10197/16384	0.622375
--0.1790777412	0.5720411062	239/384	0.622396
--0.1786649086	0.5721331671	5099/8192	0.622437
--0.178649881	0.5724730475000001	1235/1984	0.62248
--0.1784438353	0.5729563124	10199/16384	0.622498
--0.1787948682	0.5731408469	1255/2016	0.62252
--0.1789423118	0.5728877296	1265/2032	0.622539
--0.1788985491	0.5728896843	1275/2048	0.622559
--0.1788208781	0.5728106729	10201/16384	0.62262
--0.179311834	0.5724113495	5101/8192	0.622681
--0.1797994141	0.5730391602	10203/16384	0.622742
--0.1803759513	0.5725998812	1273/2044	0.622798
--0.1803720455	0.5725960641	2551/4096	0.622803
--0.1800495893	0.572523008	10205/16384	0.622864
--0.1800024769	0.5722394	5103/8192	0.622925
--0.179964897	0.5723334037	10207/16384	0.622986
--0.1799858099	0.5723314445	1271/2040	0.623039
--0.1799860169	0.5723315823	319/512	0.623047
--0.1799860169	0.5723315823	319/512	0.623047
--0.1799839173	0.5723265863	10209/16384	0.623108
--0.1800098946	0.5723291872	425/682	0.623167
--0.180010001	0.5723291563	5105/8192	0.623169
--0.1800034071	0.572369333	10211/16384	0.62323
--0.1799617205	0.5724340915	2553/4096	0.623291
--0.1799668586	0.5724267579	1117/1792	0.623326
--0.1800598864	0.5724993178	10213/16384	0.623352
--0.1798131716	0.5723533974	5107/8192	0.623413
--0.1797983559	0.5723815967	399/640	0.623437
--0.1797455799	0.5720963064	10215/16384	0.623474
--0.1796915312	0.5721093787	1237/1984	0.623488
--0.1796141493	0.5720303619	419/672	0.623512
--0.1795741096	0.5720273614	1267/2032	0.623524
--0.1795495	0.5720567173	1277/2048	0.623535
--0.1795247238	0.5719829545	10217/16384	0.623596
--0.1795865778	0.5718580311	5109/8192	0.623657
--0.1797303253	0.5718902015	10219/16384	0.623718
--0.1798769757	0.5717913736	1275/2044	0.623777
--0.1798765887	0.5717910514	2555/4096	0.623779
--0.1797522645	0.5717316046	10221/16384	0.62384
--0.1797197886	0.5714933983	5111/8192	0.623901
--0.179665945	0.571595853	10223/16384	0.623962
--0.1796868998	0.5715936002999999	1273/2040	0.62402
--0.1796869166	0.5715935471	639/1024	0.624023
--0.1796869166	0.5715935471	639/1024	0.624023
--0.1796848892	0.5715885299	10225/16384	0.624084
--0.1797105298	0.5715923404	1277/2046	0.624145
--0.1797105203	0.5715923158	5113/8192	0.624146
--0.179702616	0.5716293918	10227/16384	0.624207
--0.1796550523	0.57170322	2557/4096	0.624268
--0.1796104615	0.5717102731	10229/16384	0.624329
--0.1795931715	0.5716929587	959/1536	0.624349
--0.1795768367	0.5716521457	5115/8192	0.62439
--0.1795224034	0.5717058935	10231/16384	0.624451
--0.1795484191	0.5717102651	1199/1920	0.624479
--0.1795472435	0.5717057525	1239/1984	0.624496
--0.1795461828	0.5717062504	1259/2016	0.624504
--0.1795463705	0.5717064461	1269/2032	0.624508
--0.1795463874	0.5717063927	1279/2048	0.624512
--0.1795445561	0.5717013362	10233/16384	0.624573
--0.179572314	0.5717063083	5117/8192	0.624634
--0.1795664319	0.5717264063	10235/16384	0.624695
--0.1795802172	0.5717293965	1277/2044	0.624755
--0.1795802177	0.5717293961	2559/4096	0.624756
--0.1795810615	0.5717209187	5/8	0.625
--0.1795810615	0.5717209187	5/8	0.625
--0.179581236	0.5717214339	1279/2046	0.625122
--0.1795791101	0.5717177438	5123/8192	0.625366
--0.1795819278	0.571711421	1281/2048	0.625488
--0.1795819293	0.5717114229	1271/2032	0.625492
--0.1795819168	0.5717114255	1261/2016	0.625496
--0.179581946	0.5717113535	1241/1984	0.625504
--0.1795821289	0.5717114769	1201/1920	0.625521
--0.179581532	0.5717122033	10249/16384	0.625549
--0.1795815805	0.5717121528	1121/1792	0.625558
--0.1795726107	0.571706366	5125/8192	0.62561
--0.1795931715	0.5716929587	961/1536	0.625651
--0.1795969752	0.5717167829	2563/4096	0.625732
--0.1796100116	0.5717101104	10253/16384	0.625793
--0.1796080361	0.5717406924	5127/8192	0.625854
--0.1796224411	0.571739842	10255/16384	0.625916
--0.1796200287	0.5717368169	641/1024	0.625977
--0.1796200295	0.5717368192	1277/2040	0.62598
--0.179619549	0.5717376076	10257/16384	0.626038
--0.1796172356	0.57173414	5129/8192	0.626099
--0.1796172364	0.5717341399	427/682	0.6261
--0.1796224225	0.571729587	10259/16384	0.62616
--0.179652284	0.5717036372	2565/4096	0.626221
--0.1796295217	0.5717723454	5131/8192	0.626343
--0.1795824006	0.5717720371	10263/16384	0.626404
--0.1795779803	0.5717934774	1283/2048	0.626465
--0.1795774002	0.5717932598	421/672	0.626488
--0.179579486	0.5717913828	1243/1984	0.626512
--0.179584191	0.5717913505	10265/16384	0.626526
--0.1795890235	0.5718016657	401/640	0.626563
--0.1795910282	0.5718580503	5133/8192	0.626587
--0.1795209513	0.5718070272	10267/16384	0.626648
--0.1794625437	0.571809198	2567/4096	0.626709
--0.1794626007	0.5718092143	183/292	0.626712
--0.1794769068	0.571840328	10269/16384	0.62677
--0.1794473041	0.571871307	5135/8192	0.626831
--0.1794658254	0.5718677725	10271/16384	0.626892
--0.1794632756	0.5718650401000001	321/512	0.626953
--0.1794632756	0.5718650401	321/512	0.626953
--0.1794632653	0.5718650439	1279/2040	0.626961
--0.1794627966	0.571865854	10273/16384	0.627014
--0.1794605518	0.5718619707	5137/8192	0.627075
--0.1794605498	0.5718619749	1283/2046	0.627077
--0.1794664455	0.571858901	10275/16384	0.627136
--0.1794782702	0.5718567005	2569/4096	0.627197
--0.1794756195	0.5718399974	10277/16384	0.627258
--0.1794908069	0.5718846303	5139/8192	0.627319
--0.1794526449	0.5719646081	10279/16384	0.62738
--0.1795725274	0.5720443949	1285/2048	0.627441
--0.1795741096	0.5720273614	1275/2032	0.627461
--0.1796141493	0.5720303619	1265/2016	0.62748
--0.1796179904	0.5721334335	10281/16384	0.627502
--0.1796915312	0.5721093787	1245/1984	0.62752
--0.1793433147	0.5724574046	5141/8192	0.627563
--0.1790777412	0.5720411062	241/384	0.627604
--0.1793003991	0.5718585714	2571/4096	0.627686
--0.1793001048	0.571858682	1283/2044	0.627691
--0.1791635988	0.5718066177	10285/16384	0.627747
--0.179363727	0.5716599501	5143/8192	0.627808
--0.1792811303	0.5715840937	10287/16384	0.627869
--0.1792792276	0.5716130601	643/1024	0.62793
--0.1792792276	0.5716130601	643/1024	0.62793
--0.1792792194	0.5716132003	427/680	0.627941
--0.1792859523	0.5716112605	10289/16384	0.627991
--0.1792799273	0.5716420252	5145/8192	0.628052
--0.1792799695	0.5716420553	1285/2046	0.628055
--0.1792296233	0.5716378447	10291/16384	0.628113
--0.1789718311	0.5715793919	2573/4096	0.628174
--0.1789643035	0.5712476646	10293/16384	0.628235
--0.1791415005	0.571253691	965/1536	0.628255
--0.1792976509	0.5713557961	5147/8192	0.628296
--0.1794794309	0.5711281088	10295/16384	0.628357
--0.1793654623	0.5711089279	1287/2048	0.628418
--0.1793701579	0.5711070577	1277/2032	0.628445
--0.1793673487	0.5711297276	181/288	0.628472
--0.1793738366	0.571134611	10297/16384	0.628479
--0.179260758	0.5711087975	1247/1984	0.628528
--0.1792122147	0.5711255488	5149/8192	0.62854
--0.1792423659	0.570982814	10299/16384	0.628601
--0.1791217561	0.5709705741	1207/1920	0.628646
--0.179127502	0.5709635318	2575/4096	0.628662
--0.1791273516	0.5709641311	1285/2044	0.628669
--0.1791494508	0.5710126837	10301/16384	0.628723
--0.179117418	0.5710449791	5151/8192	0.628784
--0.1791345497	0.5710408215	10303/16384	0.628845
--0.1791321571	0.5710380851	161/256	0.628906
--0.1791321571	0.5710380851	161/256	0.628906
--0.1791321552	0.5710380378	1283/2040	0.628922
--0.1791316743	0.5710388727	10305/16384	0.628967
--0.1791294455	0.571035013	5153/8192	0.629028
--0.1791294296	0.5710349996	39/62	0.629032
--0.1791355864	0.5710319341	10307/16384	0.629089
--0.1791484901	0.5710309477	2577/4096	0.62915
--0.1791483877	0.5710088032	10309/16384	0.629211
--0.1791533133	0.5710594302	5155/8192	0.629272
--0.1791290764	0.5710989665	10311/16384	0.629333
--0.1791466362	0.5711113959	1289/2048	0.629395
--0.1791452415	0.5711115835	1279/2032	0.629429
--0.1791474825	0.5711050129	10313/16384	0.629456
--0.1791472638	0.5711054783	141/224	0.629464
--0.1792243601	0.5711246532	5157/8192	0.629517
--0.179260758	0.5711087975	1249/1984	0.629536
--0.1791415005	0.571253691	967/1536	0.629557
--0.1791128218	0.5711620543	10315/16384	0.629578
--0.1790138302	0.5711257847	2579/4096	0.629639
--0.1790130858	0.5711260481	1287/2044	0.629648
--0.1789670667	0.5712695694	10317/16384	0.6297
--0.178736588	0.5708608221	5159/8192	0.629761
--0.1782279615	0.5708062121	10319/16384	0.629822
--0.1781393701	0.5712924881	645/1024	0.629883
--0.1781393701	0.5712924881	645/1024	0.629883
--0.1781252149	0.5712886055	257/408	0.629902
--0.1781210924	0.5714032807	10321/16384	0.629944
--0.1777886517	0.5713464801	5161/8192	0.630005
--0.1777878861	0.5713490483	1289/2046	0.63001
--0.1778091771	0.5713470676	1129/1792	0.630022
--0.1776162731	0.5709635543	10323/16384	0.630066
--0.1767303657	0.5695156146	2581/4096	0.630127
--0.1781913784	0.5680547857	10325/16384	0.630188
--0.1787050388	0.570099448	5163/8192	0.630249
--0.1792076151	0.570528947	10327/16384	0.63031
--0.1793728491	0.5703737246	1291/2048	0.630371
--0.1793111278	0.5703497492	10329/16384	0.630432
--0.1792815139	0.5702988551	1271/2016	0.630456
--0.1798258034	0.5698843369	5165/8192	0.630493
--0.1798450168	0.5704586536	1251/1984	0.630544
--0.1798114574	0.5705979561	10331/16384	0.630554
--0.1801128027	0.5708896317	2583/4096	0.630615
--0.1801148179	0.5708917123	1289/2044	0.630626
--0.1802265289	0.570653559	10333/16384	0.630676
--0.1805216091	0.5706281881	1211/1920	0.630729
--0.1805288833	0.5706414827	5167/8192	0.630737
--0.1804119576	0.5705715257	10335/16384	0.630798
--0.1804118669	0.5705984123	323/512	0.630859
--0.1804118669	0.5705984123	323/512	0.630859
--0.1804113064	0.5705982132	429/680	0.630882
--0.1804183588	0.570596476	10337/16384	0.63092
--0.1804111721	0.5706281305	5169/8192	0.630981
--0.1804109466	0.5706282381	1291/2046	0.630987
--0.1803645517	0.5706148897	10339/16384	0.631042
--0.180292165	0.5705660438	2585/4096	0.631104
--0.1803004129	0.5705714052	1131/1792	0.631138
--0.1802040094	0.5706691145	10341/16384	0.631165
--0.1803706318	0.5703653045	5171/8192	0.631226
--0.181097028	0.5693710226	1293/2048	0.631348
--0.1811178609	0.5690575803	1283/2032	0.631398
--0.1812820089	0.5691028864	10345/16384	0.631409
--0.1819983422	0.569238926	1273/2016	0.631448
--0.1822784523	0.56982133	5173/8192	0.63147
--0.1815986073	0.570349359	10347/16384	0.631531
--0.1814753779	0.5706254403	1253/1984	0.631552
--0.1814567128	0.5709814171	2587/4096	0.631592
--0.1814475154	0.5709860052	1291/2044	0.631605
--0.1820130685	0.5710067011	10349/16384	0.631653
--0.1822036169	0.572003857	5175/8192	0.631714
--0.1825094798	0.5715257957	1213/1920	0.631771
--0.1825207161	0.5715325549	10351/16384	0.631775
--0.1824104717	0.5715451262	647/1024	0.631836
--0.1824104717	0.5715451262	647/1024	0.631836
--0.1824148789	0.5715429418	1289/2040	0.631863
--0.1824211568	0.5715705702	10353/16384	0.631897
--0.1822936231	0.5715536155	5177/8192	0.631958
--0.1822942368	0.5715518354	431/682	0.631965
--0.182319596	0.5713693059	10355/16384	0.632019
--0.1825527283	0.5708911728	2589/4096	0.63208
--0.1827859727	0.5707895298	10357/16384	0.632141
--0.182918453	0.5708799083	971/1536	0.632161
--0.1830714799	0.5711630887	5179/8192	0.632202
--0.183490869	0.570679987	10359/16384	0.632263
--0.1832702283	0.5707043865	1295/2048	0.632324
--0.1832928508	0.5707502715	1285/2032	0.632382
--0.1832935478	0.5707455762	10361/16384	0.632385
--0.1830553497	0.5707265367	425/672	0.63244
--0.1830423679	0.570732165	5181/8192	0.632446
--0.183060502	0.5705716022	10363/16384	0.632507
--0.1829445192	0.570581817	1255/1984	0.63256
--0.1829426461	0.5705812341	2591/4096	0.632568
--0.1829404553	0.5705807111	1293/2044	0.632583
--0.1829680104	0.5706242198	10365/16384	0.632629
--0.182942976	0.5706559503	5183/8192	0.63269
--0.1829589777	0.570651176	10367/16384	0.632751
--0.182956512	0.5706487333	81/128	0.632812
--0.182956512	0.5706487333	81/128	0.632812
--0.1829567062	0.5706487646	1291/2040	0.632843
--0.182956124	0.5706495146	10369/16384	0.632874
--0.1829537115	0.5706460621	5185/8192	0.632935
--0.1829537772	0.5706460096	1295/2046	0.632942
--0.1829592462	0.570642619	10371/16384	0.632996
--0.1829716033	0.5706403843	2593/4096	0.633057
--0.1829718426	0.5706171124	10373/16384	0.633118
--0.1829786366	0.5706685563	5187/8192	0.633179
--0.1829533185	0.5707085691	10375/16384	0.63324
--0.1829705801	0.5707229219	1297/2048	0.633301
--0.1829718665	0.5707161982	10377/16384	0.633362
--0.1829719911	0.570716227	1287/2032	0.633366
--0.1829716192	0.5707166814	1135/1792	0.633371
--0.1830648195	0.5707599879	5189/8192	0.633423
--0.1830553497	0.5707265367	1277/2016	0.633433
--0.182918453	0.5708799083	973/1536	0.633464
--0.1829262997	0.5707702261	10379/16384	0.633484
--0.1828478691	0.5707153334	2595/4096	0.633545
--0.1828522106	0.5707153914999999	1257/1984	0.633569
--0.1827513677	0.5707860986	10381/16384	0.633606
--0.1827085393	0.5705755961	5191/8192	0.633667
--0.182615486	0.5706229932	10383/16384	0.633728
--0.1826395593	0.5706355955	649/1024	0.633789
--0.1826395593	0.5706355955	649/1024	0.633789
--0.1826382445	0.5706359009	431/680	0.633824
--0.1826403586	0.5706291822	10385/16384	0.63385
--0.1826404913	0.5706292232	1217/1920	0.633854
--0.182665074	0.5706450757	5193/8192	0.633911
--0.1826648695	0.5706455459999999	1297/2046	0.63392
--0.1826438684	0.5706883778	10387/16384	0.633972
--0.1824555493	0.5709399113	2597/4096	0.634033
--0.1819376606	0.5709387713	10389/16384	0.634094
--0.1824647948	0.5704441437	5195/8192	0.634155
--0.1827825768	0.570259539	10391/16384	0.634216
--0.1827145829	0.5700772565	1299/2048	0.634277
--0.182680923	0.5701246471	10393/16384	0.634338
--0.1826890588	0.5701284492000001	1289/2032	0.63435
--0.182188858	0.5696554777	5197/8192	0.634399
--0.1819983422	0.569238926	1279/2016	0.634425
--0.1831467582	0.5695929489	10395/16384	0.63446
--0.1840455733	0.5691629863	2599/4096	0.634521
--0.1840887719	0.5691723993	1297/2044	0.63454
--0.1837145156	0.5687208868	1259/1984	0.634577
--0.1834358382	0.5685110255	10397/16384	0.634583
--0.1847985528	0.5667446091	5199/8192	0.634644
--0.1840759657	0.5654888947	10399/16384	0.634705
--0.183836958	0.5656571884	325/512	0.634766
--0.183836958	0.5656571884	325/512	0.634766
--0.1838272921	0.5656215556999999	259/408	0.634804
--0.1838977728	0.5657057061	10401/16384	0.634827
--0.1834995461	0.5658255371	5201/8192	0.634888
--0.1834981459	0.5658170909	1219/1920	0.634896
--0.1834860034	0.5658137035	433/682	0.634897
--0.183460523	0.5652749208	10403/16384	0.634949
--0.1825770334	0.5640773106	10405/16384	0.635071
--0.1851144706	0.5642405867	5203/8192	0.635132
--0.188089314	0.5653378879	10407/16384	0.635193
--0.1930225684	0.56427514	1301/2048	0.635254
--0.1939755332	0.5637969215	10409/16384	0.635315
--0.1964983755	0.5626111179	1291/2032	0.635335
--0.194931209	0.5707870903	5205/8192	0.635376
--0.1906880235	0.5716341539000001	61/96	0.635417
--0.1901496142	0.5689204797	10411/16384	0.635437
--0.1873812177	0.5697616942	2603/4096	0.635498
--0.1872811675	0.5696681158	1299/2044	0.635519
--0.187517038	0.5718357224	10413/16384	0.635559
--0.1863605639	0.5710731467	1261/1984	0.635585
--0.1850251857	0.5714697086	5207/8192	0.63562
--0.1853530258	0.5725447163	10415/16384	0.635681
--0.1855251934	0.5723256903	651/1024	0.635742
--0.1855251934	0.5723256903	651/1024	0.635742
--0.1855144353	0.5723493888	1297/2040	0.635784
--0.1854605784	0.572305189	10417/16384	0.635803
--0.1856799157	0.5720806588	5209/8192	0.635864
--0.1856852292	0.5720895414	1301/2046	0.635875
--0.1860671565	0.5724156463	10419/16384	0.635925
--0.1866986778	0.5748166364	2605/4096	0.635986
--0.1852874555	0.576029174	10421/16384	0.636047
--0.1845005712	0.5753265925	977/1536	0.636068
--0.1841200468	0.5739939697	5211/8192	0.636108
--0.1821103572	0.5742911965	10423/16384	0.636169
--0.1825336133	0.5749943191	1303/2048	0.63623
--0.1826283472	0.5748138251	10425/16384	0.636292
--0.182790408	0.5749868437	1293/2032	0.636319
--0.1833629487	0.57579031	5213/8192	0.636353
--0.1823491596	0.5763885684	1283/2016	0.636409
--0.1825423591	0.5764313307	10427/16384	0.636414
--0.1831981574	0.5771158422	2607/4096	0.636475
--0.1831709452	0.5771403494	1301/2044	0.636497
--0.183316813	0.5767305257	10429/16384	0.636536
--0.1836321102	0.5766541087	1263/1984	0.636593
--0.1836344551	0.5766513161	5215/8192	0.636597
--0.1835088312	0.576597705	10431/16384	0.636658
--0.1835113711	0.5766259580999999	163/256	0.636719
--0.1835113711	0.5766259581	163/256	0.636719
--0.1835127524	0.5766234439	433/680	0.636765
--0.1835180731	0.5766229629	10433/16384	0.63678
--0.1835149477	0.5766581685	5217/8192	0.636841
--0.18351453	0.5766570012	1303/2046	0.636852
--0.1834611788	0.5766497492	10435/16384	0.636902
--0.1833736218	0.5765955472	2609/4096	0.636963
--0.183374815	0.5765926114	1223/1920	0.636979
--0.1832347743	0.57670261	10437/16384	0.637024
--0.1834791493	0.5763926775	5219/8192	0.637085
--0.1838168989	0.5762676444	10439/16384	0.637146
--0.1837708703	0.57610833	1305/2048	0.637207
--0.1836817224	0.5760835751	1295/2032	0.637303
--0.1834962556	0.5755641979	5221/8192	0.637329
--0.1845005712	0.5753265925	979/1536	0.63737
--0.1842178509	0.5759721408	10443/16384	0.63739
--0.1842138009	0.5758948169	1285/2016	0.637401
--0.1846178448	0.5766441018	2611/4096	0.637451
--0.1845724447	0.5766291102	1303/2044	0.637476
--0.1856796676	0.576297803	10445/16384	0.637512
--0.1850295105	0.5792754403	5223/8192	0.637573
--0.1859671199	0.5792172871	1265/1984	0.637601
--0.1862762689	0.581588354	10447/16384	0.637634
--0.1870977252	0.5812958648	653/1024	0.637695
--0.1870977252	0.5812958648	653/1024	0.637695
--0.1869069599	0.5812369186	1301/2040	0.637745
--0.1869192475	0.5810829173	10449/16384	0.637756
--0.1884418581	0.5813209881	5225/8192	0.637817
--0.1883436465	0.5813154740000001	435/682	0.63783
--0.1883516752	0.5812503221	1143/1792	0.637835
--0.1877938662	0.5828637002	10451/16384	0.637878
--0.1849928622	0.585294562	2613/4096	0.637939
--0.1830984405	0.5855589207	10453/16384	0.638
--0.1824508775	0.5843332773	245/384	0.638021
--0.1833123982	0.5823585399	5227/8192	0.638062
--0.1814880972	0.5799787331	10455/16384	0.638123
--0.1805743176	0.5810130058	1307/2048	0.638184
--0.1809516877	0.5810671105	10457/16384	0.638245
--0.1802449345	0.5821894795	1297/2032	0.638287
--0.1795765402	0.5832846046	5229/8192	0.638306
--0.1773938357	0.5815063763	10459/16384	0.638367
--0.1747403364	0.583218206	2615/4096	0.638428
--0.1748977717	0.5829938243	1305/2044	0.638454
--0.1761354348	0.5840272524	10461/16384	0.638489
--0.1765939129	0.5854537562	5231/8192	0.63855
--0.1768172875	0.5848635913	1267/1984	0.638609
--0.1768188244	0.5848599891	10463/16384	0.638611
--0.1766881519	0.5848758329	327/512	0.638672
--0.1766881519	0.5848758329	327/512	0.638672
--0.1766934161	0.5849037559	1303/2040	0.638725
--0.1767030679	0.5849084129	10465/16384	0.638733
--0.1765337156	0.5848935812	5233/8192	0.638794
--0.1765445754	0.5848999620999999	1307/2046	0.638807
--0.1765758363	0.5846412828	10467/16384	0.638855
--0.1768219358	0.584253862	2617/4096	0.638916
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--0.1765135371	0.5836903571	10469/16384	0.638977
--0.1777313895	0.5846605255	5235/8192	0.639038
--0.1777948019	0.5844702707	409/640	0.639062
--0.1783986018	0.586296146	10471/16384	0.639099
--0.1793291039	0.5865648265	1309/2048	0.63916
--0.1798666507	0.5861889019	10473/16384	0.639221
--0.1797578748	0.5875684979	1299/2032	0.639272
--0.1797621331	0.5876726986	5237/8192	0.639282
--0.1787524039	0.5877443606	10475/16384	0.639343
--0.1771511064	0.5887394222	1289/2016	0.639385
--0.1776841927	0.5887498003	2619/4096	0.639404
--0.1777987604	0.5885550793	1307/2044	0.639432
--0.1787851901	0.5893977311	10477/16384	0.639465
--0.1796576192	0.5916290534	5239/8192	0.639526
--0.1800660332	0.5903049967	10479/16384	0.639587
--0.1798014067	0.5903415886	1269/1984	0.639617
--0.1798329539	0.590388908	655/1024	0.639648
--0.1798329539	0.590388908	655/1024	0.639648
--0.1798752355	0.5904514475	87/136	0.639706
--0.1798741885	0.5904446089	10481/16384	0.639709
--0.1795515471	0.5904663065	5241/8192	0.639771
--0.1795827521	0.5904723328	119/186	0.639785
--0.1795581006	0.5900141521	10483/16384	0.639832
--0.1800599968	0.5892477858	2621/4096	0.639893
--0.1803222004	0.5890308129	10485/16384	0.639954
--0.1805142634	0.5890888137	983/1536	0.639974
--0.1808356841	0.5894144136	5243/8192	0.640015
--0.1811444298	0.5886588542	10487/16384	0.640076
--0.1808750936	0.5887298939	1229/1920	0.640104
--0.1809123294	0.5887588913	1311/2048	0.640137
--0.1809557828	0.5888023961	10489/16384	0.640198
--0.1806613471	0.5888224591	1301/2032	0.640256
--0.1806632099	0.5888223193	5245/8192	0.640259
--0.1806370832	0.5886479686	10491/16384	0.64032
--0.1804942649	0.5886746037	1291/2016	0.640377
--0.180494352	0.5886752481	2623/4096	0.640381
--0.1805011146	0.5886632173	187/292	0.640411
--0.1805245655	0.5887254401	10493/16384	0.640442
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--0.1805250995	0.5887640087	10495/16384	0.640564
--0.1805211443	0.5887610926	41/64	0.640625
--0.1805211443	0.5887610926	41/64	0.640625
--0.1805207446	0.5887623732	10497/16384	0.640686
--0.1805207446	0.5887623732	1307/2040	0.640686
--0.1805164603	0.588757754	5249/8192	0.640747
--0.1805167773	0.5887582329	437/682	0.640762
--0.1805238279	0.5887517378	10499/16384	0.640808
--0.1805409813	0.5887464283	2625/4096	0.640869
--0.1805469034	0.5887190603	10501/16384	0.64093
--0.1805558061	0.5887845444	5251/8192	0.640991
--0.1805272991	0.5888448962	10503/16384	0.641052
--0.1805544791	0.5888622741	1313/2048	0.641113
--0.1805518779	0.588862684	1231/1920	0.641146
--0.1805549932	0.5888515805	10505/16384	0.641174
--0.1805546969	0.588852448	1149/1792	0.641183
--0.1806602581	0.5889245904	5253/8192	0.641235
--0.1806622444	0.5889273232	1303/2032	0.64124
--0.1805142634	0.5890888137	985/1536	0.641276
--0.1804977556	0.588937504	10507/16384	0.641296
--0.1803772714	0.5888678984	431/672	0.641369
--0.1803928744	0.5888787615	1311/2044	0.641389
--0.1802449314	0.5889408014	10509/16384	0.641418
--0.1801785174	0.5886705585	5255/8192	0.641479
--0.1800358646	0.5887282249	10511/16384	0.641541
--0.1800717363	0.5887511845	657/1024	0.641602
--0.1800717363	0.5887511845	657/1024	0.641602
--0.180069146	0.588751571	1273/1984	0.641633
--0.1800737671	0.5887404083	10513/16384	0.641663
--0.1800740149	0.5887405042	77/120	0.641667
--0.1801125415	0.5887690343	5257/8192	0.641724
--0.1801094735	0.5887662238	1313/2046	0.64174
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--0.179668026	0.5890531979	2629/4096	0.641846
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--0.1798684935	0.5884286339	5259/8192	0.641968
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--0.1801356312	0.5880354446	411/640	0.642188
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--0.1801092387	0.5875835003	1305/2032	0.642224
--0.1807302229	0.5877354688	10523/16384	0.642273
--0.1812078904	0.5874739162	2631/4096	0.642334
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--0.1811856297	0.5875284764000001	1313/2044	0.642368
--0.1810072496	0.587249874	10525/16384	0.642395
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--0.1809285873	0.5870177815	10527/16384	0.642517
--0.1809618601	0.587028283	329/512	0.642578
--0.1809618601	0.587028283	329/512	0.642578
--0.1809617584	0.5870188764	10529/16384	0.642639
--0.1809617471	0.5870188228	1275/1984	0.642641
--0.1809614331	0.5870197581	437/680	0.642647
--0.1809997268	0.5870408529	5265/8192	0.6427
--0.1808856955	0.5871572485	1315/2046	0.642717
--0.1808752123	0.5871664764	2633/4096	0.642822
--0.180910361	0.587322254	10533/16384	0.642883
--0.1806490307	0.5869888188	5267/8192	0.642944
--0.1806692831	0.5861849156	10535/16384	0.643005
--0.1800922144	0.5856080578	1317/2048	0.643066
--0.1794213187	0.585930256	10537/16384	0.643127
--0.1806061185	0.5835810826	5269/8192	0.643188
--0.1802449345	0.5821894795	1307/2032	0.643209
--0.1824508775	0.5843332773	247/384	0.643229
--0.1815578049	0.5852508293	10539/16384	0.64325
--0.1821903318	0.5863182478	2635/4096	0.643311
--0.1821197328	0.5860891150999999	1297/2016	0.643353
--0.1833034131	0.5862492125	10541/16384	0.643372
--0.1828627162	0.588203047	5271/8192	0.643433
--0.1841708361	0.5882409784	10543/16384	0.643494
--0.1839315019	0.587977803	659/1024	0.643555
--0.1839315019	0.587977803	659/1024	0.643555
--0.1839067764	0.5880642364000001	1313/2040	0.643627
--0.183791187	0.5879634559	1277/1984	0.643649
--0.1836706572	0.5877442143	5273/8192	0.643677
--0.1836905346	0.5877680635	439/682	0.643695
--0.1840939133	0.5873386384	10547/16384	0.643738
--0.1867921566	0.5861769378	2637/4096	0.643799
--0.1898796967	0.5864806276	10549/16384	0.64386
--0.1899928116	0.5890384501	989/1536	0.64388
--0.1864954825	0.5909480446	5275/8192	0.643921
--0.1844593474	0.5973819905	10551/16384	0.643982
--0.1877251702	0.5978761339	1319/2048	0.644043
--0.1872902241	0.5969714576	10553/16384	0.644104
--0.1951700719	0.6001565552	5277/8192	0.644165
--0.1954696061	0.6030849943	1309/2032	0.644193
--0.1908303	0.6043371673	10555/16384	0.644226
--0.1939614742	0.608425172	1237/1920	0.644271
--0.1935385519	0.6084065949	2639/4096	0.644287
--0.192314711	0.6083887686	1317/2044	0.644325
--0.1951400984	0.6067422099999999	433/672	0.644345
--0.1951141202	0.6067077477	10557/16384	0.644348
--0.1971061818	0.6065919721	5279/8192	0.644409
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--0.1963138642	0.606167531	165/256	0.644531
--0.1963138642	0.606167531	165/256	0.644531
--0.196371713	0.6061498287	10561/16384	0.644592
--0.1964259105	0.6060939166	263/408	0.644608
--0.1962967899	0.6064231432	5281/8192	0.644653
--0.1962972749	0.6064247732	1279/1984	0.644657
--0.1963005401	0.6063689188	1319/2046	0.644673
--0.1959031699	0.6062736519	10563/16384	0.644714
--0.1953385418	0.6057374743	2641/4096	0.644775
--0.1940631052	0.6058591406	10565/16384	0.644836
--0.1964506645	0.6043504463	5283/8192	0.644897
--0.1995232078	0.6041991006	10567/16384	0.644958
--0.1997023069	0.602656667	1321/2048	0.64502
--0.1992217883	0.6029211645	10569/16384	0.645081
--0.20373949	0.5960069244	5285/8192	0.645142
--0.2117295591	0.5963640101	1311/2032	0.645177
--0.2085835548	0.6020343163	991/1536	0.645182
--0.2039625888	0.6037974863	10571/16384	0.645203
--0.2036634851	0.6097584409	2643/4096	0.645264
--0.2048669559	0.6085620751	413/640	0.645312
--0.2104896102	0.6135248225	10573/16384	0.645325
--0.2135160817	0.6130332507	1301/2016	0.645337
--0.1917437121	0.6238607684	5287/8192	0.645386
--0.1862462306	0.6301356484	10575/16384	0.645447
--0.1882556701	0.6309450948999999	661/1024	0.645508
--0.1882556701	0.6309450949	661/1024	0.645508
--0.1881878014	0.6302382197	10577/16384	0.645569
--0.1881799416	0.6289056115	439/680	0.645588
--0.1912838886	0.6315649748	5289/8192	0.64563
--0.1909628596	0.6314191197	1157/1792	0.645647
--0.1903570565	0.6311886665000001	1321/2046	0.64565
--0.1940202544	0.6299043538	1281/1984	0.645665
--0.1884808233	0.6364734507	10579/16384	0.645691
--0.1750565492	0.6347144303	2645/4096	0.645752
--0.1689289119	0.631632626	10581/16384	0.645813
--0.1780832512	0.6236401537	5291/8192	0.645874
--0.1816791831	0.6135069076	10583/16384	0.645935
--0.1774127918	0.6126661432	1323/2048	0.645996
--0.1778592624	0.6140199237	10585/16384	0.646057
--0.1699251	0.6099686212	5293/8192	0.646118
--0.1706717052	0.6059539706	1313/2032	0.646161
--0.1746340839	0.60452092	10587/16384	0.646179
--0.1729317277	0.5985662131	2647/4096	0.64624
--0.1735222644	0.5994663857	1321/2044	0.646282
--0.1700736837	0.5997930812	10589/16384	0.646301
--0.1692665293	0.5969620363	1303/2016	0.646329
--0.1666103705	0.5985978679	1241/1920	0.646354
--0.1666466162	0.5983944399	5295/8192	0.646362
--0.1673118534	0.6001066324	10591/16384	0.646423
--0.1675450427	0.599788997	331/512	0.646484
--0.1675450427	0.599788997	331/512	0.646484
--0.1674380099	0.5997496513	10593/16384	0.646545
--0.1674164866	0.5996542641	1319/2040	0.646569
--0.1678339337	0.5994232436	5297/8192	0.646606
--0.1682785172	0.6000117448	10595/16384	0.646667
--0.1682590112	0.5999879723	1283/1984	0.646673
--0.1686583654	0.6011043327	1159/1792	0.646763
--0.170375061	0.6016776518	10597/16384	0.64679
--0.165788369	0.6029384195	5299/8192	0.646851
--0.1595906784	0.598900282	10599/16384	0.646912
--0.155622183	0.5997280467	1325/2048	0.646973
--0.1563923973	0.6014463136	10601/16384	0.647034
--0.1498059517	0.5938575326	5301/8192	0.647095
--0.1549744206	0.5921798866	1315/2032	0.647146
--0.1564656801	0.592717492	10603/16384	0.647156
--0.1615257264	0.589239124	2651/4096	0.647217
--0.1603880783	0.589344481	189/292	0.64726
--0.1593045091	0.5856681187	10605/16384	0.647278
--0.1639787415	0.5788639628	5303/8192	0.647339
--0.1591529098	0.5786804421	1243/1920	0.647396
--0.1591609114	0.578554159	10607/16384	0.6474
--0.15978161	0.5793937424	663/1024	0.647461
--0.15978161	0.5793937424	663/1024	0.647461
--0.1599655179	0.579189669	10609/16384	0.647522
--0.1600905352	0.5794873491	1321/2040	0.647549
--0.1603779083	0.580338115	5305/8192	0.647583
--0.1604905615	0.5802613615	1325/2046	0.647605
--0.1587333295	0.5809900911	10611/16384	0.647644
--0.1556550197	0.5803659985	1285/1984	0.647681
--0.1548926805	0.5808536184	2653/4096	0.647705
--0.1525400143	0.5806134761	10613/16384	0.647766
--0.1518846592	0.5791148899	995/1536	0.647786
--0.153216349	0.5759705064	5307/8192	0.647827
--0.1469507432	0.5753987531	10615/16384	0.647888
--0.1483094908	0.5770420592	1327/2048	0.647949
--0.1486034042	0.576644448	10617/16384	0.64801
--0.1493986462	0.5785257821	5309/8192	0.648071
--0.1482590755	0.5795644652	1317/2032	0.64813
--0.1482521763	0.5795163101	10619/16384	0.648132
--0.1489910163	0.5805313546	2655/4096	0.648193
--0.1489623098	0.5803420953	1325/2044	0.648239
--0.1492296221	0.5801720468	10621/16384	0.648254
--0.1497060254	0.5801338573	1307/2016	0.648313
--0.1497052667	0.5801327783	5311/8192	0.648315
--0.1495742481	0.5799923928	10623/16384	0.648376
--0.1495595942	0.580032066	83/128	0.648438
--0.1495595942	0.580032066	83/128	0.648438
--0.1495710971	0.5800339917	10625/16384	0.648499
--0.1495637201	0.5800513746	441/680	0.648529
--0.149539612	0.5800768524	5313/8192	0.64856
--0.1495479049	0.5800812572	1327/2046	0.648583
--0.1494765648	0.5800282608	10627/16384	0.648621
--0.1493980052	0.5799014187	1287/1984	0.64869
--0.1492351922	0.5799048942	10629/16384	0.648743
--0.1501826583	0.5797690168	10631/16384	0.648865
--0.1502466253	0.57953189	1329/2048	0.648926
--0.1501656825	0.5795401184	10633/16384	0.648987
--0.1501722634	0.5795422628	1163/1792	0.648996
--0.1504117631	0.5788963679	5317/8192	0.649048
--0.1518846592	0.5791148899	997/1536	0.649089
--0.1508915361	0.579746748	10635/16384	0.649109
--0.1508704358	0.5797317719	1319/2032	0.649114
--0.1507799798	0.5807578971	2659/4096	0.64917
--0.151014397	0.5807088764	1327/2044	0.649217
--0.1514960827	0.5812671897	10637/16384	0.649231
--0.1501804487	0.5828079212	5319/8192	0.649292
--0.1511200827	0.5834645722	10639/16384	0.649353
--0.1511282601	0.5831534467	665/1024	0.649414
--0.1511282601	0.5831534467	665/1024	0.649414
--0.1510478923	0.5831708668	10641/16384	0.649475
--0.1510482094	0.5831689149	1247/1920	0.649479
--0.1510423153	0.5830513067	265/408	0.64951
--0.1511181925	0.5828238052	5321/8192	0.649536
--0.1516923424	0.5828589656	10643/16384	0.649597
--0.1535757451	0.5839319496	2661/4096	0.649658
--0.1530718833	0.5835200994999999	1289/1984	0.649698
--0.1560762768	0.5862890288	10645/16384	0.649719
--0.1502184111	0.5858547202	5323/8192	0.64978
--0.1466853031	0.5837531862	10647/16384	0.649841
--0.1451055523	0.5853759729	1331/2048	0.649902
--0.1458484957	0.585624181	10649/16384	0.649963
--0.141349926	0.590109706	5325/8192	0.650024
--0.1388590597	0.5822009517	10651/16384	0.650085
--0.1373627987	0.5814081476	1321/2032	0.650098
--0.1346478717	0.5762568327	2663/4096	0.650146
--0.133958932	0.5780417094	1329/2044	0.650196
--0.1318086515	0.5780190221	10653/16384	0.650208
--0.126681773	0.5757230977	5327/8192	0.650269
--0.1272466922	0.5769234747	437/672	0.650298
--0.1268776544	0.5785404974	10655/16384	0.65033
--0.1274134033	0.5781557307	333/512	0.650391
--0.1274134033	0.5781557307	333/512	0.650391
--0.1272959709	0.5780165392	10657/16384	0.650452
--0.1276545854	0.5777557785	1327/2040	0.65049
--0.1280435638	0.5778126697	5329/8192	0.650513
--0.1280433583	0.5778295478	1249/1920	0.650521
--0.1279720102	0.5775997634	121/186	0.650538
--0.1284112411	0.5788654373	10659/16384	0.650574
--0.1287344328	0.5809981931	2665/4096	0.650635
--0.130756742	0.5815761658	10661/16384	0.650696
--0.1304182609	0.5812852211	1291/1984	0.650706
--0.121974167	0.582663384	5331/8192	0.650757
--0.1177188887	0.5709810389	10663/16384	0.650818
--0.1127854916	0.5688148553	1333/2048	0.650879
--0.111986304	0.5708712336	10665/16384	0.65094
--0.1091178729	0.557413006	5333/8192	0.651001
--0.1197697585	0.5613565202	10667/16384	0.651062
--0.124502649	0.5617431892	1323/2032	0.651083
--0.1283622295	0.5632452592	2667/4096	0.651123
--0.1288994015	0.5602759255	1331/2044	0.651174
--0.1306249459	0.5590414074	10669/16384	0.651184
--0.141973623	0.5622397617	5335/8192	0.651245
--0.1440353018	0.5578753555	1313/2016	0.65129
--0.1419181587	0.555139968	10671/16384	0.651306
--0.1406546337	0.5561540111	667/1024	0.651367
--0.1406546337	0.5561540111	667/1024	0.651367
--0.1409253085	0.5564378951	10673/16384	0.651428
--0.1399017686	0.5567213164	443/680	0.651471
--0.1392899766	0.5570163182	5337/8192	0.651489
--0.1392429218	0.557444213	43/66	0.651515
--0.1382082498	0.5546783714	10675/16384	0.65155
--0.1377058302	0.5548367099	417/640	0.651563
--0.1372129713	0.5491679407	2669/4096	0.651611
--0.1342444858	0.5430841935	10677/16384	0.651672
--0.1397370984	0.5400887041	1001/1536	0.651693
--0.1429364936	0.5452537312	1293/1984	0.651714
--0.1468259123	0.5445947471	5339/8192	0.651733
--0.1530095206	0.5310920172	10679/16384	0.651794
--0.147306921	0.5324769363	1335/2048	0.651855
--0.1478574847	0.533423448	10681/16384	0.651917
--0.143306336	0.534347579	5341/8192	0.651978
--0.1404636013	0.5307022177	10683/16384	0.652039
--0.1364259766	0.5320505517	1325/2032	0.652067
--0.1373790168	0.5324677932	2671/4096	0.6521
--0.1378943932	0.5330399599	1333/2044	0.652153
--0.1381272877	0.5330335582	10685/16384	0.652161
--0.1380730423	0.5343625738	5343/8192	0.652222
--0.1384608042	0.5341531356	1315/2016	0.652282
--0.1384606354	0.5341526144	10687/16384	0.652283
--0.1383895808	0.5340930947	167/256	0.652344
--0.1383895808	0.5340930947	167/256	0.652344
--0.1383768454	0.5341100015	10689/16384	0.652405
--0.1383514702	0.5340262918999999	1331/2040	0.652451
--0.138324321	0.5340235542	5345/8192	0.652466
--0.1382883407	0.5340113782	445/682	0.652493
--0.1384573546	0.5339378254	10691/16384	0.652527
--0.1387504003	0.5338577798	2673/4096	0.652588
--0.1387507649	0.5338653867000001	1253/1920	0.652604
--0.1387882064	0.5336219486	10693/16384	0.652649
--0.1390198411	0.5345168089	5347/8192	0.65271
--0.1390170132	0.5344934623000001	1295/1984	0.652722
--0.1386420806	0.5356022214	10695/16384	0.652771
--0.1391190229	0.5358447148	1337/2048	0.652832
--0.1391526429	0.5357021092	10697/16384	0.652893
--0.1400941581	0.5362124145	5349/8192	0.652954
--0.1397370984	0.5400887041	1003/1536	0.652995
--0.1384496845	0.5371317463	10699/16384	0.653015
--0.136881941	0.5360382285	1327/2032	0.653051
--0.1361521444	0.5365381548	2675/4096	0.653076
--0.1352344137	0.5372611232	1335/2044	0.653131
--0.1350992147	0.5377318846	10701/16384	0.653137
--0.131822333	0.5343868115	5351/8192	0.653198
--0.1301909806	0.5358454851	439/672	0.653274
--0.1304442828	0.5360901948	669/1024	0.65332
--0.130508752	0.5359575529	10705/16384	0.653381
--0.1310094456	0.5364136845	5353/8192	0.653442
--0.1309861986	0.5363724188	1171/1792	0.65346
--0.1312648352	0.5363603009	1337/2046	0.65347
--0.1303418667	0.537445153	10707/16384	0.653503
--0.1247760483	0.5376582244	2677/4096	0.653564
--0.1221954219	0.5355623252	10709/16384	0.653625
--0.1232363883	0.5326844686	251/384	0.653646
--0.12732094	0.5327203272	5355/8192	0.653687
--0.1278416822	0.5306476201	1297/1984	0.65373
--0.1301289635	0.5281524275	10711/16384	0.653748
--0.1274048635	0.5272856435	1339/2048	0.653809
--0.1274177983	0.527906519	10713/16384	0.65387
--0.1245164943	0.5275569479	5357/8192	0.653931
--0.1230400491	0.5234436587	10715/16384	0.653992
--0.1175137259	0.5243841641	1329/2032	0.654035
--0.1178284046	0.5238028416	2679/4096	0.654053
--0.1186420093	0.5253416452	191/292	0.65411
--0.1186651815	0.5252047002	10717/16384	0.654114
--0.1183789695	0.5273879897	5359/8192	0.654175
--0.1190040016	0.5271128002	10719/16384	0.654236
--0.1189324872	0.5269779792	1319/2016	0.654266
--0.1189098126	0.5270022509	335/512	0.654297
--0.1189098126	0.5270022509	335/512	0.654297
--0.118882875	0.5270225651	10721/16384	0.654358
--0.1188367942	0.5268587394000001	89/136	0.654412
--0.1188350713	0.5268712536	5361/8192	0.654419
--0.1187563591	0.5268377591	1339/2046	0.654448
--0.1190662555	0.5267884719	10723/16384	0.65448
--0.1195159751	0.5267694087	2681/4096	0.654541
--0.1194725359	0.5267533771	1173/1792	0.654576
--0.1196763155	0.5264894011	10725/16384	0.654602
--0.1197215921	0.5277431085	5363/8192	0.654663
--0.119896704	0.5277624455	419/640	0.654687
--0.1191293698	0.5290690803	10727/16384	0.654724
--0.1193287123	0.5291593764	1299/1984	0.654738
--0.1196378913	0.5294231528	1341/2048	0.654785
--0.1197283188	0.5292709733	10729/16384	0.654846
--0.1205217852	0.5310991889	5365/8192	0.654907
--0.1188137409	0.5303857425	10731/16384	0.654968
--0.1172958936	0.5307207143	1331/2032	0.65502
--0.1173312016	0.5306460594	2683/4096	0.655029
--0.1175730797	0.5314218189	1339/2044	0.655088
--0.1175615722	0.5314051863	10733/16384	0.65509
--0.1171145545	0.5332506248	5367/8192	0.655151
--0.1178923319	0.5328826206	10735/16384	0.655212
--0.1177633512	0.5327798983000001	1321/2016	0.655258
--0.1177706723	0.5327836812	671/1024	0.655273
--0.1177706723	0.5327836812	671/1024	0.655273
--0.1177442144	0.5328103494	10737/16384	0.655334
--0.1176736715	0.5326530278	1337/2040	0.655392
--0.1176767605	0.532653012	5369/8192	0.655396
--0.1175945364	0.5326305565	447/682	0.655425
--0.1178986705	0.5325478364	10739/16384	0.655457
--0.1182972919	0.5324872192	2685/4096	0.655518
--0.1186135639	0.5321686133	10741/16384	0.655579
--0.1187947825	0.5325562029000001	1007/1536	0.655599
--0.1186714459	0.5329513247	5371/8192	0.65564
--0.1192419097	0.5329048445	10743/16384	0.655701
--0.1191357701	0.5327489277	1259/1920	0.655729
--0.1191148575	0.5327739967	1301/1984	0.655746
--0.1191216562	0.5327774757	1343/2048	0.655762
--0.1190963627	0.532802133	10745/16384	0.655823
--0.1190399154	0.5326709857	5373/8192	0.655884
--0.1191322249	0.5325741684	10747/16384	0.655945
--0.1190808018	0.5324778518	1333/2032	0.656004
--0.1190807953	0.5324779445	2687/4096	0.656006
--0.1190590509	0.5324993713	1341/2044	0.656067
--0.1190590534	0.5324993855	10749/16384	0.656067
--0.1190141878	0.532495765	5375/8192	0.656128
--0.1190202062	0.5325103131	10751/16384	0.656189
--0.1190227223	0.5325080183000001	21/32	0.65625
--0.1190227223	0.5325080183	21/32	0.65625
--0.119025706	0.5325061393	5377/8192	0.656372
--0.119025706	0.5325061395	1339/2040	0.656373
--0.1190262367	0.532504372	1343/2046	0.656403
--0.1190279266	0.5325114037	10755/16384	0.656433
--0.1190291917	0.5325220636	2689/4096	0.656494
--0.1190365772	0.5325253749	10757/16384	0.656555
--0.1190049887	0.5325286923	5379/8192	0.656616
--0.1189681513	0.5325118671	10759/16384	0.656677
--0.1189578637	0.5325281026	1345/2048	0.656738
--0.1189575796	0.5325280362	1303/1984	0.656754
--0.1189583218	0.5325269486999999	1261/1920	0.656771
--0.1189627731	0.5325303384	10761/16384	0.656799
--0.1189625811	0.5325299996	1177/1792	0.656808
--0.1189391335	0.5325583895	5381/8192	0.65686
--0.1187947825	0.5325562029000001	1009/1536	0.656901
--0.1189145751	0.5324998009	10763/16384	0.656921
--0.1189092258	0.5323752953999999	1343/2044	0.657045
--0.119037927	0.5322693338	5383/8192	0.657104
--0.1189857153	0.5321938454	10767/16384	0.657166
--0.1189740313	0.5322151383	673/1024	0.657227
--0.1189740313	0.5322151383	673/1024	0.657227
--0.1189737516	0.5322150714	1325/2016	0.657242
--0.1189788124	0.5322177803	10769/16384	0.657288
--0.1189613912	0.532234944	5385/8192	0.657349
--0.1189613155	0.5322349948	447/680	0.657353
--0.1189638564	0.5322461975	1345/2046	0.65738
--0.1189279713	0.5322107302	10771/16384	0.65741
--0.118855189	0.5321157214	2693/4096	0.657471
--0.1185551485	0.5322099749	10773/16384	0.657532
--0.1191219584	0.5320461701	5387/8192	0.657593
--0.1193167715	0.5322828034	10775/16384	0.657654
--0.1194515461	0.5322156829	1347/2048	0.657715
--0.1194362133	0.5322097868	1305/1984	0.657762
--0.1194266493	0.5321831711	10777/16384	0.657776
--0.1194803477	0.5321309113	421/640	0.657813
--0.1196547046	0.53209489	5389/8192	0.657837
--0.1197500535	0.5324391086	10779/16384	0.657898
--0.1200419247	0.5326960541	2695/4096	0.657959
--0.1200380586	0.5327016726	1337/2032	0.657972
--0.1201206111	0.5325713189	10781/16384	0.65802
--0.1201210159	0.5325734535	1345/2044	0.658023
--0.1203853972	0.5325084807	5391/8192	0.658081
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--0.1203007885	0.5324500064	337/512	0.658203
--0.1203007885	0.5324500064	337/512	0.658203
--0.1203011769	0.5324488588	1327/2016	0.658234
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--0.1202875753	0.5324686439	79/120	0.658333
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--0.1232363883	0.5326844686	253/384	0.658854
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--0.1182472192	0.5375087508	1309/1984	0.659778
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--0.1124538863	0.5400916928	1313/1984	0.661794
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--0.100763531	0.5311353379	1315/1984	0.662802
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--0.0993981791	0.5177068468	1273/1920	0.663021
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--0.1001202859	0.5183314523	10865/16384	0.663147
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--0.0942832776	0.5154560819	5435/8192	0.663452
--0.0890896805	0.5140331978	10871/16384	0.663513
--0.089762867	0.5157592711	1359/2048	0.663574
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--0.08930112480000001	0.5189186314999999	1317/1984	0.66381
--0.0892872298	0.5189327098	2719/4096	0.663818
--0.0895738619	0.5187944412	1349/2032	0.663878
--0.0895725596	0.5187969076	10877/16384	0.663879
--0.0896584066	0.5187121103	1357/2044	0.663894
--0.0900332167	0.518947274	5439/8192	0.66394
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--0.0899926471	0.518796964	10881/16384	0.664124
--0.0899526988	0.5187887229	5441/8192	0.664185
--0.08995267	0.5187887507	1339/2016	0.664187
--0.0899377329	0.5187992228	271/408	0.664216
--0.0899323685	0.5188130349	453/682	0.664223
--0.0899592753	0.5187270956	10883/16384	0.664246
--0.0899968943	0.5186201835	2721/4096	0.664307
--0.0899562709	0.5185540407	10885/16384	0.664368
--0.0902556163	0.5186615572	5443/8192	0.664429
--0.0905407205	0.518949777	10887/16384	0.66449
--0.0906942409	0.518834712	1361/2048	0.664551
--0.0906639824	0.5187904961	10889/16384	0.664612
--0.09066321889999999	0.5187942808	1191/1792	0.664621
--0.0909683747	0.518675252	5445/8192	0.664673
--0.0923118377	0.5188779614	1021/1536	0.664714
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--0.0905196464	0.5199189195	2723/4096	0.664795
--0.0905446949	0.5198884196	1319/1984	0.664819
--0.0906854531	0.5203974961	10893/16384	0.664856
--0.0906897743	0.5203712439	1351/2032	0.664862
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--0.0892952475	0.5212487519	5447/8192	0.664917
--0.0897317126	0.5221070999	10895/16384	0.664978
--0.0898940308	0.5219062473	681/1024	0.665039
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--0.08985513	0.5218613166	10897/16384	0.6651
--0.08985618920000001	0.5218615539	1277/1920	0.665104
--0.09008025	0.52174192	5449/8192	0.665161
--0.0900622507	0.5217405964	149/224	0.665179
--0.0900922514	0.5216393451	1357/2040	0.665196
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--0.0908209663	0.5230399172	2725/4096	0.665283
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--0.0841373785	0.5212189507	1363/2048	0.665527
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--0.0808734807	0.5219606767	5453/8192	0.665649
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--0.0787087129	0.5115703179	2727/4096	0.665771
--0.0768397059	0.5118934648	1321/1984	0.665827
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--0.0610421499	0.5086784067	1365/2048	0.666504
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--0.0819028584	0.4964800378	1323/1984	0.666835
--0.0899415166	0.5015547249	5463/8192	0.66687
--0.0949364109	0.4963869722	10927/16384	0.666931
--0.0933230852	0.4957195739	683/1024	0.666992
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--0.0931066778	0.4960017235	10929/16384	0.667053
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--0.0905389715	0.4948583453	455/682	0.667155
--0.0909880481	0.4942411569	1361/2040	0.667157
--0.0917839008	0.4936188245	1345/2016	0.667163
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--0.0981645478	0.4892021934	2733/4096	0.667236
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--0.1176564601	0.5065239674	10935/16384	0.667419
--0.1196416376	0.5014175623	1367/2048	0.66748
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--0.1205363355	0.4970593154	5469/8192	0.667603
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--0.1249966783	0.4900539384	1325/1984	0.667843
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--0.1810054261	0.4968297107	10977/16384	0.669983
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--0.1810922166	0.4975010454	457/682	0.670088
--0.1805809629	0.4972893475	1367/2040	0.670098
--0.1803858562	0.4974361488	10979/16384	0.670105
--0.1792853585	0.4968063903	193/288	0.670139
--0.1788987193	0.4972609457	2745/4096	0.670166
--0.1790118634	0.4972886649	1201/1792	0.670201
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--0.1817533901	0.4885011042	10983/16384	0.670349
--0.1794013338	0.4871250109	1373/2048	0.67041
--0.1793318774	0.4876447839	10985/16384	0.670471
--0.1758705716	0.4866649409	5493/8192	0.670532
--0.1836230141	0.479321883	10987/16384	0.670593
--0.1939962209	0.4821471293	2747/4096	0.670654
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--0.2006431907	0.4746707925	1371/2044	0.670744
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--0.1940310841	0.4696556829	1331/1984	0.670867
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--0.1945133337	0.4698370545	5497/8192	0.671021
--0.1946064709	0.4702645937	1373/2046	0.671065
--0.1937961145	0.4705208011	1369/2040	0.671078
--0.1938605101	0.4705239395	10995/16384	0.671082
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--0.1922708662	0.4714274476	2749/4096	0.671143
--0.192661508	0.4722123317	10997/16384	0.671204
--0.1928797438	0.4719543165	1031/1536	0.671224
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--0.1877016466	0.4698193681	1375/2048	0.671387
--0.1877348717	0.4697401982	11001/16384	0.671448
--0.1880661234	0.4700440767	5501/8192	0.671509
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--0.1879960415	0.4708083768	11005/16384	0.671692
--0.1880962244	0.4708411813	1373/2044	0.671722
--0.1881474615	0.4707945186	1365/2032	0.671752
--0.1881474459	0.4707945311	5503/8192	0.671753
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--0.1881231649	0.4707719991	11009/16384	0.671936
--0.188119749	0.4707761503	5505/8192	0.671997
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--0.1881123586	0.4707701339	11011/16384	0.672058
--0.1881123582	0.470770136	457/680	0.672059
--0.1881012264	0.4707527761	2753/4096	0.672119
--0.1881012223	0.4707527839	1355/2016	0.672123
--0.1880918291	0.4707577214	11013/16384	0.67218
--0.1881424502	0.4707197061	5507/8192	0.672241
--0.1882424628	0.470724168	11015/16384	0.672302
--0.1882495545	0.4706793541	1377/2048	0.672363
--0.1882501894	0.4706807211	1291/1920	0.672396
--0.1882417607	0.4706814836	11017/16384	0.672424
--0.1882421414	0.4706815048	1205/1792	0.672433
--0.1882334661	0.4706227047	5509/8192	0.672485
--0.1882154373	0.4706372339	1033/1536	0.672526
--0.1883816294	0.4706832326	11019/16384	0.672546
--0.1884964993	0.470968693	11021/16384	0.672668
--0.1883484265	0.4711934437	1375/2044	0.672701
--0.1882365144	0.4714822454	5511/8192	0.672729
--0.1882339201	0.4714826947	1367/2032	0.672736
--0.1884712895	0.4716362159	11023/16384	0.672791
--0.1884726988	0.4715766293	689/1024	0.672852
--0.1884726988	0.4715766293	689/1024	0.672852
--0.1884733694	0.4715780315	1335/1984	0.672883
--0.1884643622	0.4715785316	11025/16384	0.672913
--0.1884894152	0.4715006066	459/682	0.673021
--0.1885573226	0.4715324564	11027/16384	0.673035
--0.1885570007	0.4715334204	1373/2040	0.673039
--0.1888056756	0.4715568669	2757/4096	0.673096
--0.1888079184	0.4715614316	1357/2016	0.673115
--0.1887870642	0.4714113173	11029/16384	0.673157
--0.1882788497	0.4722951093	5515/8192	0.673218
--0.1873073016	0.4716372302	11031/16384	0.673279
--0.1868882507	0.4719553756	1379/2048	0.67334
--0.186973174	0.4719970562	11033/16384	0.673401
--0.1869039042	0.4721639945	431/640	0.673438
--0.1865910343	0.4725300934	5517/8192	0.673462
--0.1856114934	0.471468499	11035/16384	0.673523
--0.1842648867	0.4705707437	2759/4096	0.673584
--0.184219202	0.4710261914	11037/16384	0.673645
--0.1835260542	0.4710457442	1377/2044	0.673679
--0.1832305548	0.4715642211	5519/8192	0.673706
--0.1832202945	0.4715380027	1369/2032	0.67372
--0.1835215949	0.4716994666	11039/16384	0.673767
--0.1835229822	0.4716464678	345/512	0.673828
--0.1835150494	0.4716477051	11041/16384	0.673889
--0.1835150352	0.471647707	1337/1984	0.673891
--0.1835253187	0.4716025317	5521/8192	0.67395
--0.183547641	0.4715739397	1379/2046	0.673998
--0.1836038492	0.4716191716	11043/16384	0.674011
--0.1836010194	0.4716155745	275/408	0.67402
--0.1837427034	0.4716909216	151/224	0.674107
--0.1837979331	0.4716266144	11045/16384	0.674133
--0.1836293265	0.4721265359	5523/8192	0.674194
--0.1827400559	0.472808974	11047/16384	0.674255
--0.183142387	0.4733252677	1381/2048	0.674316
--0.1831864538	0.4732159915	11049/16384	0.674377
--0.1839213691	0.4734828183	5525/8192	0.674438
--0.1838433202	0.4732141553	259/384	0.674479
--0.1800043216	0.4758877186	11051/16384	0.6745
--0.1803222561	0.4699742056	2763/4096	0.674561
--0.1790232035	0.4689784516	11053/16384	0.674622
--0.1816061345	0.4672500423	197/292	0.674658
--0.1842483264	0.4656512117	5527/8192	0.674683
--0.1840119039	0.4656338033	1371/2032	0.674705
--0.1831469715	0.4627805258	11055/16384	0.674744
--0.1827995657	0.4633072735	691/1024	0.674805
--0.1827995657	0.4633072735	691/1024	0.674805
--0.1828795624	0.4633407367	11057/16384	0.674866
--0.1827982237	0.4634749977	1339/1984	0.674899
--0.1825481619	0.4637041973	5529/8192	0.674927
--0.1821843892	0.463886655	1381/2046	0.674976
--0.1818353425	0.4631888821	11059/16384	0.674988
--0.1817584832	0.4632738325	27/40	0.675
--0.1801354498	0.4616281235	2765/4096	0.675049
--0.1800492822	0.4621015935	1361/2016	0.675099
--0.1793329411	0.4626019941	11061/16384	0.67511
--0.1797703211	0.4627393352	1037/1536	0.67513
--0.1854702122	0.4564923658	5531/8192	0.675171
--0.1944446972	0.4492732078	11063/16384	0.675232
--0.1903974382	0.4477477296	1383/2048	0.675293
--0.1904469441	0.4482408202	11065/16384	0.675354
--0.1877608284	0.4478566253	5533/8192	0.675415
--0.1867701017	0.4436288185	11067/16384	0.675476
--0.1832415247	0.4428009811	1297/1920	0.675521
--0.1833494706	0.4427001579	2767/4096	0.675537
--0.1836477734	0.4432498379	11069/16384	0.675598
--0.1829891262	0.4439265021	1381/2044	0.675636
--0.1829567204	0.4443561311	5535/8192	0.675659
--0.1830311585	0.4442893811	1373/2032	0.675689
--0.1832311946	0.4443661244	11071/16384	0.67572
--0.183218523	0.4443237905	173/256	0.675781
--0.183218523	0.4443237905	173/256	0.675781
--0.1832133816	0.4443262764	11073/16384	0.675842
--0.1832092711	0.4442910884	5537/8192	0.675903
--0.1832092625	0.4442910465	1341/1984	0.675907
--0.1832230302	0.444253936	461/682	0.675953
--0.1832739514	0.4442816431	11075/16384	0.675964
--0.1832867989	0.4442619436	1379/2040	0.67598
--0.1834191019	0.4443042004	2769/4096	0.676025
--0.1834371957	0.4442425774	11077/16384	0.676086
--0.1834378834	0.4442426133	1363/2016	0.676091
--0.1834069796	0.4446876102	5539/8192	0.676147
--0.1829281787	0.4452569008	11079/16384	0.676208
--0.1831527163	0.4454905292	1385/2048	0.67627
--0.1831736872	0.4454459978	11081/16384	0.676331
--0.1834831534	0.4456398571	5541/8192	0.676392
--0.1835026783	0.4455149427	1039/1536	0.676432
--0.1826408607	0.4462257444	11083/16384	0.676453
--0.1809054695	0.4452316117	2771/4096	0.676514
--0.1808340987	0.4454949976	433/640	0.676562
--0.180321698	0.4458422951	11085/16384	0.676575
--0.1784402928	0.4440143373	1383/2044	0.676614
--0.1768138728	0.441763542	5543/8192	0.676636
--0.1766915322	0.4427303419	1375/2032	0.676673
--0.1744186455	0.4436251707	11087/16384	0.676697
--0.1749841528	0.4438268384	693/1024	0.676758
--0.1749841528	0.4438268384	693/1024	0.676758
--0.1749997064	0.4437552379	11089/16384	0.676819
--0.1753773715	0.4439630038	5545/8192	0.67688
--0.175365326	0.4439517645	1213/1792	0.676897
--0.1754570939	0.4438764826	1343/1984	0.676915
--0.1756910835	0.4442921559	1385/2046	0.676931
--0.1751058691	0.4447122697	11091/16384	0.676941
--0.1753556531	0.444905716	1381/2040	0.676961
--0.1743339294	0.4467917436	2773/4096	0.677002
--0.1753870795	0.4470503756	11093/16384	0.677063
--0.1753688988	0.4467019951	65/96	0.677083
--0.1662476004	0.4395228065	5547/8192	0.677124
--0.1824845164	0.4307874932	11095/16384	0.677185
--0.1846574351	0.4225207061	1387/2048	0.677246
--0.1834194324	0.4226547385	11097/16384	0.677307
--0.1837305325	0.413066791	5549/8192	0.677368
--0.2097602429	0.4206804023	11099/16384	0.677429
--0.2296921987	0.447250584	2775/4096	0.67749
--0.233280922	0.4403102249	11101/16384	0.677551
--0.2582151444	0.4456348711	1385/2044	0.677593
--0.2577294353	0.4382658452	1301/1920	0.677604
--0.2579758541	0.4386793655	5551/8192	0.677612
--0.2550452281	0.4359466417	1377/2032	0.677657
--0.2534577192	0.4352035951	11103/16384	0.677673
--0.2533310816	0.4359979839	347/512	0.677734
--0.2533310816	0.4359979839	347/512	0.677734
--0.2534196297	0.4359597597	11105/16384	0.677795
--0.2533520727	0.4366109666	5553/8192	0.677856
--0.2526008078	0.4368085694	1387/2046	0.677908
--0.252122472	0.4363596973	11107/16384	0.677917
--0.2521422361	0.4363587806	1345/1984	0.677923
--0.2512854162	0.4355798395	461/680	0.677941
--0.2498513855	0.4347350358	2777/4096	0.677979
--0.2499885777	0.4347781562	1215/1792	0.678013
--0.2494386196	0.4357527622	11109/16384	0.67804
--0.2472114869	0.4325545762	1367/2016	0.678075
--0.2533776807	0.4283685521	5555/8192	0.678101
--0.2682938997	0.421642942	11111/16384	0.678162
--0.2649204118	0.4154884348	1389/2048	0.678223
--0.2647515709	0.416318623	11113/16384	0.678284
--0.2592873934	0.4133751005	5557/8192	0.678345
--0.2766967486	0.3974447483	11115/16384	0.678406
--0.3169513025	0.4579918476	2779/4096	0.678467
--0.3298263549	0.4540843108	11117/16384	0.678528
--0.3722580309	0.5161131913	5559/8192	0.678589
--0.3761909575	0.4770640468	1379/2032	0.678642
--0.3760869529	0.4805881412	1303/1920	0.678646
--0.376441213	0.4801719988	11119/16384	0.67865
--0.3737474762	0.4848877252	695/1024	0.678711
--0.3737474762	0.4848877252	695/1024	0.678711
--0.3744462772	0.4844462485	11121/16384	0.678772
--0.3730346281	0.489549108	5561/8192	0.678833
--0.369272108	0.4857070151	463/682	0.678886
--0.3658086591	0.4848921019	11123/16384	0.678894
--0.3648749549	0.4712945727	277/408	0.678922
--0.3623522064	0.4732837489	1347/1984	0.678931
--0.3581544418	0.4737869808	2781/4096	0.678955
--0.3572421173	0.4788406097	11125/16384	0.679016
--0.3582389502	0.4779668946	1043/1536	0.679036
--0.3818572869	0.4403311712	1369/2016	0.679067
--0.3800213415	0.4388511554	5563/8192	0.679077
--0.3691854036	0.4205302162	11127/16384	0.679138
--0.3705177712	0.4260188546	1391/2048	0.679199
--0.370551457	0.4254049409	11129/16384	0.67926
--0.373118452	0.4281279517	5565/8192	0.679321
--0.3673492569	0.4320200092	11131/16384	0.679382
--0.366613398	0.4341752502	2783/4096	0.679443
--0.3667134187	0.4336858145	11133/16384	0.679504
--0.3681698698	0.4340507526	1389/2044	0.67955
--0.368031013	0.434013996	5567/8192	0.679565
--0.3678720707	0.4338459743	11135/16384	0.679626
--0.3680315197	0.4340138588	1381/2032	0.679626
--0.3678701142	0.4338794527	87/128	0.679688
--0.3678701142	0.4338794527	87/128	0.679688
--0.3678720429	0.4338757752	11137/16384	0.679749
--0.3678813963	0.4339027838	5569/8192	0.67981
--0.3678421693	0.4339008286	1391/2046	0.679863
--0.3678257658	0.4339078651	11139/16384	0.679871
--0.3677526492	0.4338133049	1387/2040	0.679902
--0.3677116149	0.4338493864	2785/4096	0.679932
--0.36771168	0.4338495965	1349/1984	0.67994
--0.3677263676	0.4338962014	11141/16384	0.679993
--0.3678908715	0.4335520633	5571/8192	0.680054
--0.3678913563	0.4335512631	457/672	0.68006
--0.3686413817	0.4335278935	11143/16384	0.680115
--0.3686050717	0.4331839498	1393/2048	0.680176
--0.3686027118	0.4332354852	11145/16384	0.680237
--0.3686012482	0.4332335583	1219/1792	0.680246
--0.3683119543	0.433091091	5573/8192	0.680298
--0.368350674	0.4331460096	1045/1536	0.680339
--0.3704375438	0.4327362439	11147/16384	0.680359
--0.3694578393	0.4352442177	2787/4096	0.68042
--0.3701403432	0.4350988963	11149/16384	0.680481
--0.365613568	0.438228312	1391/2044	0.680528
--0.3664737365	0.4389580267	5575/8192	0.680542
--0.3683289842	0.4408099982	11151/16384	0.680603
--0.3683493193	0.4408524695	1383/2032	0.68061
--0.368198637	0.4403207252	697/1024	0.680664
--0.368198637	0.4403207252	697/1024	0.680664
--0.3681882495	0.4403796352	11153/16384	0.680725
--0.3681880626	0.4403801546	1307/1920	0.680729
--0.3679671202	0.4400635275	5577/8192	0.680786
--0.3684301694	0.4399320025	1393/2046	0.680841
--0.3685782792	0.4397603645	11155/16384	0.680847
--0.3701754686	0.4400751805	463/680	0.680882
--0.3700141338	0.439309195	2789/4096	0.680908
--0.3700471794	0.4393950096	1351/1984	0.680948
--0.3694905062	0.4391601886	11157/16384	0.680969
--0.3612334742	0.448575507	5579/8192	0.68103
--0.3624703957	0.4502329804	1373/2016	0.681052
--0.3601549674	0.4360359582	11159/16384	0.681091
--0.3564861231	0.4359797611	1395/2048	0.681152
--0.357020115	0.4361137935	11161/16384	0.681213
--0.3546260416	0.4388549709	5581/8192	0.681274
--0.3492612704	0.4269013122	11163/16384	0.681335
--0.3476330248	0.4166621723	2791/4096	0.681396
--0.3476090185	0.4191497598	11165/16384	0.681458
--0.3387104541	0.4206791858	199/292	0.681507
--0.3396150473	0.4208293713	5583/8192	0.681519
--0.3411892451	0.4212948929	11167/16384	0.68158
--0.3411065259	0.4212899356	1385/2032	0.681594
--0.3410997622	0.4210935804	349/512	0.681641
--0.3410997622	0.4210935804	349/512	0.681641
--0.341096588	0.4211186987	11169/16384	0.681702
--0.340975401	0.4209855525	5585/8192	0.681763
--0.3409748005	0.4209844984	1309/1920	0.681771
--0.3412015962	0.4208629813	15/22	0.681818
--0.3412844567	0.4208087364	11171/16384	0.681824
--0.3419204414	0.4210467006	1391/2040	0.681863
--0.3420935282	0.4208269472	2793/4096	0.681885
--0.341918749	0.4205950022	11173/16384	0.681946
--0.3419299027	0.4205913425	1353/1984	0.681956
--0.3420846269	0.4229734039	5587/8192	0.682007
--0.3426490289	0.4230515035	1375/2016	0.682044
--0.3386125444	0.4268156975	11175/16384	0.682068
--0.3407287043	0.4279255414	1397/2048	0.682129
--0.3404979061	0.4277141433	11177/16384	0.68219
--0.3422891606	0.4269242433	5589/8192	0.682251
--0.3422608971	0.4375616149	11179/16384	0.682312
--0.3203079701	0.4067768953	2795/4096	0.682373
--0.313853657	0.4006316809	11181/16384	0.682434
--0.3631804996	0.3879939582	1395/2044	0.682485
--0.3602854073	0.3827829002	5591/8192	0.682495
--0.3543778757	0.3510440504	11183/16384	0.682556
--0.3526735229	0.3525542557	1387/2032	0.682579
--0.3523381082	0.3529936512	699/1024	0.682617
--0.3523381082	0.3529936512	699/1024	0.682617
--0.3525761929	0.3529456113	11185/16384	0.682678
--0.3512405588	0.3546191454	5593/8192	0.682739
--0.3496668697	0.3514938981	127/186	0.682796
--0.3494804243	0.351447156	11187/16384	0.6828
--0.3493571685	0.351609805	437/640	0.682813
--0.3483059221	0.3466684325	1393/2040	0.682843
--0.3481792267	0.3468548347	2797/4096	0.682861
--0.3478406025	0.3477434782	11189/16384	0.682922
--0.3480004482	0.347684245	1049/1536	0.682943
--0.3409371371	0.3404035755	1355/1984	0.682964
--0.343752064	0.328242052	5595/8192	0.682983
--0.3263467017	0.3137028005	11191/16384	0.683044
--0.3308521056	0.3188562049	1399/2048	0.683105
--0.3306606807	0.3185070294	11193/16384	0.683167
--0.3336491378	0.3191519708	5597/8192	0.683228
--0.3344416393	0.3260145468	11195/16384	0.683289
--0.334816771	0.3280963859	2799/4096	0.68335
--0.3345904703	0.3278987486	11197/16384	0.683411
--0.3352061758	0.3271011064	1397/2044	0.683464
--0.3352149502	0.3271006768	5599/8192	0.683472
--0.3350868133	0.3271307554	11199/16384	0.683533
--0.3350991471	0.3271411758	1389/2032	0.683563
--0.3350990974	0.3271393428	175/256	0.683594
--0.3350990974	0.3271393428	175/256	0.683594
--0.3350985695	0.3271384117	11201/16384	0.683655
--0.3351077765	0.3271404005	5601/8192	0.683716
--0.3350979308	0.3271607311	1399/2046	0.683773
--0.3350987568	0.3271598676	11203/16384	0.683777
--0.3350488356	0.327194484	93/136	0.683824
--0.3350499918	0.3271913253	2801/4096	0.683838
--0.3350498231	0.3271914845	1313/1920	0.683854
--0.3350637941	0.3271956639	11205/16384	0.683899
--0.3349656718	0.3270367209	5603/8192	0.68396
--0.3349672013	0.3270370267	1357/1984	0.683972
--0.3351740992	0.3266301566	11207/16384	0.684021
--0.3351780415	0.3266343687	197/288	0.684028
--0.3350037401	0.3265599078	1401/2048	0.684082
--0.335016587	0.3265679801	11209/16384	0.684143
--0.3349055182	0.3266276974	5605/8192	0.684204
--0.3349248449	0.3266316234	1051/1536	0.684245
--0.3338910258	0.3249050916	11211/16384	0.684265
--0.3363894108	0.3267956841	2803/4096	0.684326
--0.3365405931	0.3264957098	11213/16384	0.684387
--0.3379380353	0.3297261929	1399/2044	0.684442
--0.3378735826	0.3297140273	5607/8192	0.684448
--0.3390761965	0.3290840988	11215/16384	0.684509
--0.3388896834	0.329048983	1391/2032	0.684547
--0.3388944764	0.3290680108	701/1024	0.68457
--0.3388944764	0.3290680108	701/1024	0.68457
--0.3389054584	0.329074446	11217/16384	0.684631
--0.3388008075	0.3291053224	5609/8192	0.684692
--0.3388017024	0.3291029114	1227/1792	0.68471
--0.338783126	0.3288602557	467/682	0.684751
--0.3387777363	0.3288708198	11219/16384	0.684753
--0.3389223781	0.3282456622	1397/2040	0.684804
--0.338931697	0.3282786604	2805/4096	0.684814
--0.3388083875	0.3283605228	11221/16384	0.684875
--0.3388317989	0.3283662159	263/384	0.684896
--0.3470002078	0.3329806131	5611/8192	0.684937
--0.3409371371	0.3404035755	1359/1984	0.68498
--0.334548989	0.3338527772	11223/16384	0.684998
--0.3342230906	0.3357097901	1381/2016	0.68502
--0.3345444729	0.3383377727	1403/2048	0.685059
--0.334584535	0.3386522989	11225/16384	0.68512
--0.3336408736	0.3391030281	5613/8192	0.685181
--0.3322236441	0.3405372503	11227/16384	0.685242
--0.3317171533	0.3426572518	2807/4096	0.685303
--0.3316193065	0.3422941966	11229/16384	0.685364
--0.3325728697	0.341710829	1401/2044	0.685421
--0.3325723067	0.3417098532	5615/8192	0.685425
--0.332434405	0.3417200762	11231/16384	0.685486
--0.3324457639	0.3417318723	1393/2032	0.685531
--0.3324455236	0.3417319779	351/512	0.685547
--0.3324455236	0.3417319779	351/512	0.685547
--0.3324451918	0.3417307718	11233/16384	0.685608
--0.3324548266	0.3417353164	5617/8192	0.685669
--0.3324404338	0.341754346	1403/2046	0.685728
--0.3324402788	0.3417542828	11235/16384	0.68573
--0.332380719	0.3417757619	1399/2040	0.685784
--0.3323802259	0.3417757462	2809/4096	0.685791
--0.3323807085	0.3417736332	1229/1792	0.685826
--0.3323944565	0.3417849302	11237/16384	0.685852
--0.3323337613	0.3415993883	5619/8192	0.685913
--0.3323231365	0.3416065782	439/640	0.685937
--0.3325751302	0.3412767464	11239/16384	0.685974
--0.3325423015	0.3412825649	1361/1984	0.685988
--0.3324498383	0.341179791	461/672	0.686012
--0.3324496193	0.3412001649	1405/2048	0.686035
--0.332458588	0.3412093729	11241/16384	0.686096
--0.3323568178	0.3412366501	5621/8192	0.686157
--0.3320771688	0.3403494874	11243/16384	0.686218
--0.3336406076	0.3410725324	2811/4096	0.686279
--0.3338284912	0.3411213865	11245/16384	0.68634
--0.3343446149	0.3410515024	1403/2044	0.686399
--0.3343444153	0.3410517602	5623/8192	0.686401
--0.3341802695	0.3410370582	11247/16384	0.686462
--0.3341922909	0.3410484013	1395/2032	0.686516
--0.3341923206	0.3410484175	703/1024	0.686523
--0.3341923206	0.3410484175	703/1024	0.686523
--0.3341919349	0.341047204	11249/16384	0.686584
--0.334201896	0.3410517131	5625/8192	0.686646
--0.3341873085	0.3410701928	1405/2046	0.686706
--0.3341873108	0.3410702131	11251/16384	0.686707
--0.334136861	0.3410888445	467/680	0.686765
--0.3341368738	0.3410888834	2813/4096	0.686768
--0.3341478648	0.341095695	11253/16384	0.686829
--0.3341474326	0.3410934586	1055/1536	0.686849
--0.3340361961	0.3409746004	5627/8192	0.68689
--0.3339799874	0.3409037387	11255/16384	0.686951
--0.3339905343	0.3409215254	1319/1920	0.686979
--0.3339910062	0.3409194785	1363/1984	0.686996
--0.3339907366	0.3409195749	1385/2016	0.687004
--0.3339907661	0.3409195911	1407/2048	0.687012
--0.3339904044	0.3409183674	11257/16384	0.687073
--0.3339989839	0.340922316	5629/8192	0.687134
--0.3339945367	0.3409410861	11259/16384	0.687195
--0.3339923089	0.3409497974	2815/4096	0.687256
--0.3339919852	0.3409487489	11261/16384	0.687317
--0.3339953105	0.3409474145	1405/2044	0.687378
--0.3339948679	0.3409473322	11/16	0.6875
--0.3339948679	0.3409473322	11/16	0.6875
--0.3339946076	0.34094741	1403/2040	0.687745
--0.3339959857	0.340945828	11271/16384	0.687927
--0.333995562	0.3409453029	1387/2016	0.687996
--0.333995561	0.340945303	1365/1984	0.688004
--0.3339955654	0.3409452958	1321/1920	0.688021
--0.3339955827	0.3409453511	1233/1792	0.688058
--0.333995108	0.3409453481	5637/8192	0.68811
--0.3339951665	0.340945397	1057/1536	0.688151
--0.3339945432	0.3409411657	11275/16384	0.688171
--0.3339997051	0.3409483836	2819/4096	0.688232
--0.3340007561	0.3409475969	11277/16384	0.688293
--0.3339994029	0.340961417	5639/8192	0.688354
--0.3339994019	0.3409614167	201/292	0.688356
--0.3340047228	0.3409611045	705/1024	0.688477
--0.3340047437	0.3409610585	705/1024	0.688477
--0.3340042555	0.340961036	5641/8192	0.688599
--0.3340046888	0.3409600455	11283/16384	0.68866
--0.3338682726	0.340951967	1409/2046	0.688661
--0.3340065155	0.3409579788	2821/4096	0.688721
--0.3338731033	0.3409731437	281/408	0.688725
--0.3340058238	0.340958048	11285/16384	0.688782
--0.3340363085	0.3409728298	5643/8192	0.688843
--0.3339771323	0.3409655984	11287/16384	0.688904
--0.3339659101	0.3409735683	1411/2048	0.688965
--0.3339658612	0.340973579	463/672	0.688988
--0.3339660682	0.3409732122	1367/1984	0.689012
--0.3339671154	0.3409730407	11289/16384	0.689026
--0.3339677523	0.3409759175	441/640	0.689063
--0.3339661296	0.3409839301	5645/8192	0.689087
--0.3339096883	0.3409806384	11291/16384	0.689148
--0.3338837386	0.3409118373	2823/4096	0.689209
--0.3338872664	0.3409218371	11293/16384	0.68927
--0.3338551454	0.3409496521	5647/8192	0.689331
--0.3338551442	0.340949647	1409/2044	0.689335
--0.3338619952	0.3409477726	11295/16384	0.689392
--0.3338613396	0.3409473243	353/512	0.689453
--0.3338613397	0.3409473244	353/512	0.689453
--0.3338613387	0.3409473244	1401/2032	0.689469
--0.3338608619	0.3409472625	5649/8192	0.689575
--0.3338613645	0.3409462143	11299/16384	0.689636
--0.3338613627	0.340946211	1411/2046	0.689638
--0.3338639239	0.3409446501	2825/4096	0.689697
--0.3338639224	0.3409446496	469/680	0.689706
--0.3338682688	0.3409519687	5651/8192	0.689819
--0.3338641051	0.340973881	11303/16384	0.68988
--0.3338731009	0.3409731547	1413/2048	0.689941
--0.3338731612	0.3409732212	1391/2016	0.68998
--0.3338723594	0.3409730692	11305/16384	0.690002
--0.3338724007	0.3409732195	1369/1984	0.69002
--0.3338758385	0.3409684093	5653/8192	0.690063
--0.3338749322	0.3409685959	265/384	0.690104
--0.3334313503	0.3408821578	11309/16384	0.690247
--0.3339586837	0.3407499605	5655/8192	0.690308
--0.333958707	0.3407498772	1411/2044	0.690313
--0.3339697084	0.3406270404	11311/16384	0.690369
--0.333958569	0.3406416952	707/1024	0.69043
--0.333958569	0.3406416952	707/1024	0.69043
--0.3339585207	0.3406417061	1403/2032	0.690453
--0.3339597875	0.3406411303	11313/16384	0.690491
--0.3339564925	0.3406518108	5657/8192	0.690552
--0.3339352492	0.340641158	11315/16384	0.690613
--0.3339352229	0.3406411462	471/682	0.690616
--0.3338912036	0.3405961506	2829/4096	0.690674
--0.3338911112	0.3405961875	1409/2040	0.690686
--0.3338913365	0.3406124949	11317/16384	0.690735
--0.3338933598	0.3406106244	1061/1536	0.690755
--0.3341858926	0.340243444	5659/8192	0.690796
--0.3348035605	0.3405597132	11319/16384	0.690857
--0.3347308934	0.3403890203	1415/2048	0.690918
--0.3347303073	0.3404000644	199/288	0.690972
--0.3347342229	0.3404014385	11321/16384	0.690979
--0.3346648811	0.3403553535	1371/1984	0.691028
--0.3346496443	0.3403671287	5661/8192	0.69104
--0.3346411873	0.3401489906	11323/16384	0.691101
--0.3346099172	0.3400360524	1327/1920	0.691146
--0.3346116892	0.3400327037	2831/4096	0.691162
--0.3346245276	0.3400436001	11325/16384	0.691223
--0.3345936785	0.3400857443	5663/8192	0.691284
--0.334593711	0.340085758	1413/2044	0.691292
--0.3346001604	0.3400838717	11327/16384	0.691345
--0.3345994936	0.3400834391	177/256	0.691406
--0.334599017	0.3400833924	5665/8192	0.691528
--0.3345994752	0.340082332	11331/16384	0.691589
--0.3345994798	0.3400823304	1415/2046	0.691593
--0.3346020143	0.3400805754	83/120	0.691667
--0.3346012282	0.3400803539	11333/16384	0.691711
--0.3346066277	0.3400884821	5667/8192	0.691772
--0.3345971247	0.3401089142	11335/16384	0.691833
--0.3346055569	0.3401121141	1417/2048	0.691895
--0.3346048854	0.3401116834	11337/16384	0.691956
--0.3346049062	0.3401116791	155/224	0.691964
--0.3346105421	0.3401085626	5669/8192	0.692017
--0.3346105851	0.3401087081	1373/1984	0.692036
--0.3346094996	0.3401083628	1063/1536	0.692057
--0.3346427815	0.3401621567	11339/16384	0.692078
--0.3345385658	0.3401080423	2835/4096	0.692139
--0.3345402076	0.3401124902	443/640	0.692187
--0.3345339012	0.3401236109	11341/16384	0.6922
--0.3344146433	0.3399839109	5671/8192	0.692261
--0.33441428	0.3399839777	1415/2044	0.69227
--0.3343703066	0.3400495924	11343/16384	0.692322
--0.3343796296	0.3400453616	709/1024	0.692383
--0.3343796296	0.3400453616	709/1024	0.692383
--0.3343796905	0.3400454252	1407/2032	0.692421
--0.3343788801	0.3400453113	11345/16384	0.692444
--0.3343834277	0.3400409423	5673/8192	0.692505
--0.3343834372	0.3400410983	1241/1792	0.692522
--0.3343907148	0.3400520934	11347/16384	0.692566
--0.3343907147	0.3400521432	1417/2046	0.692571
--0.3343982417	0.3400839718	2837/4096	0.692627
--0.3343983229	0.3400840692	471/680	0.692647
--0.334402357	0.3400770372	11349/16384	0.692688
--0.3341515991	0.3402680777	5675/8192	0.692749
--0.3346366413	0.3395256831	11351/16384	0.69281
--0.3348183632	0.337499794	1419/2048	0.692871
--0.334785196	0.3369845546	11353/16384	0.692932
--0.3342230906	0.3357097901	1397/2016	0.692956
--0.3369975841	0.3374036219	5677/8192	0.692993
--0.3409371371	0.3404035755	1375/1984	0.693044
--0.3368977129	0.3409665869	11355/16384	0.693054
--0.3354475569	0.3416269112	2839/4096	0.693115
--0.3356353235	0.3415641103	11357/16384	0.693176
--0.3362099412	0.3422731744	1331/1920	0.693229
--0.3362104985	0.342284294	5679/8192	0.693237
--0.3362125714	0.3422851607	1417/2044	0.693249
--0.3361763508	0.3421244664	11359/16384	0.693298
--0.3361652731	0.3421390715	355/512	0.693359
--0.3361652731	0.3421390715	355/512	0.693359
--0.3361654286	0.3421386851	1409/2032	0.693406
--0.3361665529	0.3421384524	11361/16384	0.69342
--0.3361633141	0.3421501083	5681/8192	0.693481
--0.3361396874	0.3421372821	11363/16384	0.693542
--0.3361399303	0.3421371939	43/62	0.693548
--0.3361066965	0.3420767182	2841/4096	0.693604
--0.3361072012	0.342076258	283/408	0.693627
--0.3361090081	0.3420768096	1243/1792	0.693638
--0.3360996665	0.3420932541	11365/16384	0.693665
--0.3362797908	0.3419841268	5683/8192	0.693726
--0.3367894991	0.3421191701	11367/16384	0.693787
--0.3367929439	0.3418992185	1421/2048	0.693848
--0.3367894485	0.3419175643	11369/16384	0.693909
--0.3367455678	0.341905703	1399/2016	0.693948
--0.3366796706	0.3418236149	5685/8192	0.69397
--0.3372026074	0.3407666942	11371/16384	0.694031
--0.3409371371	0.3404035755	1377/1984	0.694052
--0.3372409211	0.3456198601	2843/4096	0.694092
--0.3367334597	0.3465519306	11373/16384	0.694153
--0.3324575924	0.3478647481	5687/8192	0.694214
--0.3324292459	0.3478134153	1419/2044	0.694227
--0.3339728668	0.3484542568	1333/1920	0.694271
--0.3339786328	0.3484657093	11375/16384	0.694275
--0.3338642138	0.3483287612	711/1024	0.694336
--0.3338642138	0.3483287612	711/1024	0.694336
--0.3338624186	0.3483408117	1411/2032	0.69439
--0.3338664832	0.3483425463	11377/16384	0.694397
--0.3337684256	0.3482786945	5689/8192	0.694458
--0.3339425937	0.3481105697	11379/16384	0.694519
--0.3339372271	0.3481140961	1421/2046	0.694526
--0.3344451528	0.3479441429	2845/4096	0.69458
--0.3344401864	0.3479572855	1417/2040	0.694608
--0.3343354141	0.3478787041	11381/16384	0.694641
--0.3343398491	0.3479011005	1067/1536	0.694661
--0.3357714688	0.3492164754	5691/8192	0.694702
--0.3370593343	0.349734509	11383/16384	0.694763
--0.3367540015	0.3495746312	1423/2048	0.694824
--0.3367700134	0.3495917123	11385/16384	0.694885
--0.3365959425	0.3495949701	467/672	0.69494
--0.3366020005	0.3495944256	5693/8192	0.694946
--0.3365569819	0.3492663147	11387/16384	0.695007
--0.3365120052	0.3491423438	1379/1984	0.69506
--0.3365114512	0.3491423099	2847/4096	0.695068
--0.336523589	0.3491551832	11389/16384	0.695129
--0.3364848977	0.3491969716	5695/8192	0.69519
--0.3364845747	0.349197106	203/292	0.695205
--0.3364927157	0.3491956958	11391/16384	0.695251
--0.3364919832	0.3491950896	89/128	0.695312
--0.3364919832	0.3491950896	89/128	0.695312
--0.33649141	0.3491949633	5697/8192	0.695435
--0.3364921156	0.3491937582	11395/16384	0.695496
--0.3364953391	0.3491920523	2849/4096	0.695557
--0.3364953335	0.3491921857	473/680	0.695588
--0.336494424	0.3491916591	11397/16384	0.695618
--0.3364997692	0.3492018841	5699/8192	0.695679
--0.3364960024	0.3492299295	1425/2048	0.695801
--0.336495184	0.3492292884	11401/16384	0.695862
--0.3364952133	0.3492292857	1247/1792	0.695871
--0.3365026564	0.3492259007	5701/8192	0.695923
--0.3364959986	0.3492300686	1403/2016	0.695933
--0.3365013064	0.3492255738	1069/1536	0.695964
--0.3365189473	0.3492955537	11403/16384	0.695984
--0.336414499	0.3492127174	2851/4096	0.696045
--0.3364151754	0.3492122298	1381/1984	0.696069
--0.3364041634	0.34923154	11405/16384	0.696106
--0.3363370802	0.3490278064	5703/8192	0.696167
--0.3363400963	0.3490268284	1423/2044	0.696184
--0.3362520099	0.3490615055	11407/16384	0.696228
--0.3362648879	0.3490640565	713/1024	0.696289
--0.3362648879	0.3490640565	713/1024	0.696289
--0.3362641122	0.349063422	11409/16384	0.69635
--0.3362641095	0.3490634191	1337/1920	0.696354
--0.3362641418	0.3490634189	1415/2032	0.696358
--0.3362721795	0.3490622009	5705/8192	0.696411
--0.3362718769	0.3490792268	11411/16384	0.696472
--0.3362581617	0.3491201772	2853/4096	0.696533
--0.3362680584	0.3491147045	11413/16384	0.696594
--0.3358197139	0.3488993137	5707/8192	0.696655
--0.3366014846	0.3488249501	11415/16384	0.696716
--0.3366823334	0.3486462335	1427/2048	0.696777
--0.3366712402	0.348661984	11417/16384	0.696838
--0.3366036829	0.3485238973	5709/8192	0.696899
--0.3366070237	0.3485338255	1405/2016	0.696925
--0.3373005127	0.3482139104	11419/16384	0.69696
--0.3382229767	0.348518127	2855/4096	0.697021
--0.3380905964	0.3484412402	1383/1984	0.697077
--0.338057624	0.348462789	11421/16384	0.697083
--0.3380160268	0.3478356007	5711/8192	0.697144
--0.3380153824	0.3478313525	1425/2044	0.697162
--0.3379822248	0.3479305125	11423/16384	0.697205
--0.3379930676	0.347926469	357/512	0.697266
--0.3379930676	0.347926469	357/512	0.697266
--0.3379921461	0.3479263644	11425/16384	0.697327
--0.3379922107	0.3479265572	1417/2032	0.697343
--0.3379979038	0.3479211425	5713/8192	0.697388
--0.3379979253	0.347921124	1339/1920	0.697396
--0.3380062903	0.3479361213	11427/16384	0.697449
--0.3380058959	0.3479357569	1427/2046	0.697458
--0.3380032	0.3479800275	2857/4096	0.69751
--0.3380018268	0.3479794639	1423/2040	0.697549
--0.3380129815	0.3479733486	11429/16384	0.697571
--0.3378809655	0.3479677577	5715/8192	0.697632
--0.3376805576	0.3477423276	11431/16384	0.697693
--0.3376139386	0.347840982	1429/2048	0.697754
--0.3376213239	0.347833744	11433/16384	0.697815
--0.337640856	0.3479109315	5717/8192	0.697876
--0.3376467215	0.3478992656	67/96	0.697917
--0.3381558007	0.3451803179	2859/4096	0.697998
--0.3390479941	0.3439382908	11437/16384	0.698059
--0.3409371371	0.3404035755	1385/1984	0.698085
--0.3402041257	0.3529803498	5719/8192	0.69812
--0.3400141006	0.3527800699	1427/2044	0.698141
--0.3367643652	0.3653446677	11439/16384	0.698181
--0.3391372478	0.3663953593	715/1024	0.698242
--0.3391372478	0.3663953593	715/1024	0.698242
--0.3389913815	0.3661919437	11441/16384	0.698303
--0.3387390548	0.3658320803	1419/2032	0.698327
--0.3411966041	0.366423582	5721/8192	0.698364
--0.3389735548	0.3703621301	11443/16384	0.698425
--0.3392155376	0.3699958127	1429/2046	0.698436
--0.3392792549	0.3704468826	447/640	0.698438
--0.3319167454	0.373486716	2861/4096	0.698486
--0.3322682909	0.3726663128	95/136	0.698529
--0.333625216	0.3744688262	11445/16384	0.698547
--0.3335386904	0.3740890636	1073/1536	0.698568
--0.3222033431	0.3568473569	5723/8192	0.698608
--0.3258046919	0.3457068327	11447/16384	0.698669
--0.3232569725	0.346387994	1431/2048	0.69873
--0.3234631589	0.3463797305	11449/16384	0.698792
--0.3226847812	0.3476778839	5725/8192	0.698853
--0.3196820227	0.3464270929	1409/2016	0.698909
--0.3190388789	0.3468037642	11451/16384	0.698914
--0.3165194833	0.3473944502	2863/4096	0.698975
--0.3167870909	0.3472198548	11453/16384	0.699036
--0.3174151726	0.3479680085	1387/1984	0.699093
--0.3174045296	0.3479710729	1429/2044	0.699119
--0.3174169128	0.3478380089	11455/16384	0.699158
--0.3174047645	0.3478474603	179/256	0.699219
--0.3174047645	0.3478474603	179/256	0.699219
--0.3174059468	0.3478473562	11457/16384	0.69928
--0.3174053904	0.3478501312	1421/2032	0.699311
--0.317400434	0.3478557343	5729/8192	0.699341
--0.3173843989	0.347840248	11459/16384	0.699402
--0.3173835425	0.3478416573	477/682	0.699413
--0.3173683944	0.3477833939	2865/4096	0.699463
--0.3173683389	0.3477831328	1343/1920	0.699479
--0.3173676038	0.3477879387	1427/2040	0.69951
--0.3173582048	0.3477954977	11461/16384	0.699524
--0.3175392932	0.3477444756	5731/8192	0.699585
--0.3178663347	0.3480203714	11463/16384	0.699646
--0.3179695523	0.3478837293	1433/2048	0.699707
--0.3179570006	0.3478925081	11465/16384	0.699768
--0.3179367649	0.3477691837	5733/8192	0.699829
--0.3179250113	0.3477868884	1075/1536	0.69987
--0.318736093	0.3477755424	11467/16384	0.69989
--0.3185742906	0.3477180615	1411/2016	0.699901
--0.317576806	0.3491266915	2867/4096	0.699951
--0.3178531967	0.3493058272	11469/16384	0.700012
--0.3145642821	0.350829363	5735/8192	0.700073
--0.3146852372	0.3507341391	1431/2044	0.700098
--0.3148928454	0.3509078142	1389/1984	0.700101
--0.3155013705	0.3521567986	11471/16384	0.700134
--0.3154995488	0.3519350874	717/1024	0.700195
--0.3154995488	0.3519350874	717/1024	0.700195
--0.315490173	0.3519488676	11473/16384	0.700256
--0.3154555961	0.3519215644	1423/2032	0.700295
--0.315450973	0.3518182153	5737/8192	0.700317
--0.3154538713	0.3518200041	1255/1792	0.700335
--0.3157327203	0.3517748952	11475/16384	0.700378
--0.3157194705	0.3517548587	1433/2046	0.700391
--0.3164420838	0.3518675061	2869/4096	0.700439
--0.316380786	0.3518524912	1429/2040	0.70049
--0.3163369368	0.3517164891	11477/16384	0.7005
--0.3163275504	0.3517474252	269/384	0.700521
--0.3158020689	0.357946547	5739/8192	0.700562
--0.3084991148	0.3449068376	11479/16384	0.700623
--0.3016921711	0.3413749816	1435/2048	0.700684
--0.3021184382	0.3420554862	11481/16384	0.700745
--0.2946218343	0.3391166434	5741/8192	0.700806
--0.2984636984	0.3275029925	11483/16384	0.700867
--0.2956592103	0.3119355373	2871/4096	0.700928
--0.296074941	0.3141344431	11485/16384	0.700989
--0.2905184652	0.3187835794	5743/8192	0.70105
--0.2906158059	0.3186027919	1433/2044	0.701076
--0.2913424012	0.3186274303	1391/1984	0.701109
--0.2913428356	0.3186269144	11487/16384	0.701111
--0.2912807059	0.318562714	359/512	0.701172
--0.2912807059	0.318562714	359/512	0.701172
--0.2912812842	0.3185682852	11489/16384	0.701233
--0.2912476536	0.3185345021	1425/2032	0.70128
--0.2912357426	0.3185427145	5745/8192	0.701294
--0.2913122386	0.3184457794	11491/16384	0.701355
--0.2913068875	0.3184187845	1435/2046	0.701369
--0.2916342535	0.3183154699	2873/4096	0.701416
--0.2916309796	0.3183237254	1257/1792	0.701451
--0.2915948915	0.3182532855	477/680	0.701471
--0.2915731417	0.3182651981	11493/16384	0.701477
--0.2919915335	0.3192859126	5747/8192	0.701538
--0.292046714	0.3192503472	449/640	0.701562
--0.2909746811	0.3215093811	11495/16384	0.701599
--0.2917799408	0.3217907112	1437/2048	0.70166
--0.2917367606	0.3217480195	11497/16384	0.701721
--0.2922532563	0.3215613701	5749/8192	0.701782
--0.2928826084	0.324022162	11499/16384	0.701843
--0.2850975227	0.3227760959	1415/2016	0.701885
--0.2846918424	0.3241255158	2875/4096	0.701904
--0.2843384809	0.3267193894	11501/16384	0.701965
--0.2797005337	0.3289818474	5751/8192	0.702026
--0.2798235402	0.3285901533	205/292	0.702055
--0.2809731372	0.3285005632	11503/16384	0.702087
--0.2808618916	0.3284308832	1393/1984	0.702117
--0.2808616096	0.3284453494	719/1024	0.702148
--0.2808616096	0.3284453494	719/1024	0.702148
--0.2808642691	0.3284530078	11505/16384	0.702209
--0.2807895624	0.3284338591	1427/2032	0.702264
--0.2807925806	0.3284339023	5753/8192	0.702271
--0.2808594255	0.3282814139	11507/16384	0.702332
--0.2808320196	0.3282510652	479/682	0.702346
--0.2811700501	0.3280235904	2877/4096	0.702393
--0.2810885876	0.3279854017	1433/2040	0.702451
--0.2810916254	0.3279865941	11509/16384	0.702454
--0.2810931159	0.328001055	1079/1536	0.702474
--0.2820699996	0.3285857849	5755/8192	0.702515
--0.2828474236	0.3287610214	11511/16384	0.702576
--0.2827361712	0.3286664548	1349/1920	0.702604
--0.2827371129	0.3286793141	1439/2048	0.702637
--0.2827397695	0.328686552	11513/16384	0.702698
--0.2826796028	0.3286725108	5757/8192	0.702759
--0.2826863614	0.3285528907	11515/16384	0.70282
--0.2826602194	0.3284796948	1417/2016	0.702877
--0.2826602172	0.3284797165	2879/4096	0.702881
--0.282662608	0.328486023	11517/16384	0.702942
--0.282643768	0.3284984781	5759/8192	0.703003
--0.2826442879	0.3284978873	1437/2044	0.703033
--0.2826465996	0.3284991501	11519/16384	0.703064
--0.2826464895	0.3284988494	45/64	0.703125
--0.2826464895	0.3284988494	45/64	0.703125
--0.2826463743	0.3284987123	1429/2032	0.703248
--0.282646761	0.3284984057	1439/2046	0.703324
--0.2826480227	0.3284985667	2881/4096	0.703369
--0.2826478653	0.3284982652	287/408	0.703431
--0.2826403739	0.3285086501	11527/16384	0.703552
--0.2826429221	0.3285115251	1441/2048	0.703613
--0.2826428962	0.3285115479	1351/1920	0.703646
--0.2826428573	0.3285112511	1261/1792	0.703683
--0.2826454071	0.3285116252	5765/8192	0.703735
--0.2826451939	0.3285112692	1081/1536	0.703776
--0.2826421131	0.3285240647	11531/16384	0.703796
--0.2826145718	0.3284958338	2883/4096	0.703857
--0.2826145564	0.3284958073	473/672	0.703869
--0.2826082394	0.3285006683	11533/16384	0.703918
--0.2825968759	0.3284130967	5767/8192	0.703979
--0.2825928226	0.3284199254	1439/2044	0.704012
--0.2825609313	0.3284181771	11535/16384	0.704041
--0.2825648288	0.3284207628	721/1024	0.704102
--0.2825648288	0.3284207628	721/1024	0.704102
--0.2825648034	0.3284207856	1397/1984	0.704133
--0.2825672104	0.3284213712	5769/8192	0.704224
--0.2825672145	0.3284213757	1431/2032	0.704232
--0.2825647291	0.3284266769	11539/16384	0.704285
--0.2825657129	0.3284276826	131/186	0.704301
--0.282554036	0.3284391277	2885/4096	0.704346
--0.2825578335	0.3284395576	11541/16384	0.704407
--0.2825578419	0.3284395603	479/680	0.704412
--0.2824733491	0.3283638293	5771/8192	0.704468
--0.2827382992	0.328345151	11543/16384	0.704529
--0.2827972442	0.3282703258	1443/2048	0.70459
--0.2827903174	0.3282736541	11545/16384	0.704651
--0.2827844306	0.3282565423	451/640	0.704688
--0.2830597979	0.3282011794	11547/16384	0.704773
--0.2834837259	0.3284630442	2887/4096	0.704834
--0.2834776109	0.328467917	203/288	0.704861
--0.2834484662	0.3284069334	11549/16384	0.704895
--0.2835841877	0.3281779833	5775/8192	0.704956
--0.2835831244	0.3281892503	1441/2044	0.70499
--0.2835465931	0.3281944514	11551/16384	0.705017
--0.2835502335	0.3281968064	361/512	0.705078
--0.2835502335	0.3281968064	361/512	0.705078
--0.2835501599	0.3281965329	1399/1984	0.705141
--0.283552604	0.3281973592	5777/8192	0.7052
--0.283552553	0.3281973745	1433/2032	0.705217
--0.2835499146	0.3282026929	11555/16384	0.705261
--0.2835508109	0.3282038151	481/682	0.705279
--0.2835366646	0.3282120776	2889/4096	0.705322
--0.2835399841	0.3282138937	11557/16384	0.705383
--0.2835399055	0.3282139098	1439/2040	0.705392
--0.2835070262	0.3281734416	5779/8192	0.705444
--0.2835097961	0.3280382083	11559/16384	0.705505
--0.2834568165	0.3280468335	1445/2048	0.705566
--0.2834604439	0.3280479445	11561/16384	0.705627
--0.2834390935	0.3280730778	5781/8192	0.705688
--0.2834441948	0.328073289	271/384	0.705729
--0.2833197459	0.327982096	11563/16384	0.70575
--0.2842136034	0.3277446886	1423/2016	0.705853
--0.2834734225	0.3297804564	5783/8192	0.705933
--0.2836342749	0.3298254051	1443/2044	0.705969
--0.2838114001	0.3306098881	11567/16384	0.705994
--0.2838471402	0.330490532	723/1024	0.706055
--0.2838471402	0.330490532	723/1024	0.706055
--0.2838403786	0.3304945911	11569/16384	0.706116
--0.2838347762	0.3304762969	1401/1984	0.706149
--0.2838442693	0.3304251341	5785/8192	0.706177
--0.2838419499	0.330427503	1435/2032	0.706201
--0.2839978784	0.3304467805	11571/16384	0.706238
--0.2840137193	0.3304147054	1445/2046	0.706256
--0.2843992493	0.3306229268	2893/4096	0.706299
--0.2843788022	0.3305257254	1441/2040	0.706373
--0.2843679775	0.3305314642	1085/1536	0.70638
--0.2835709563	0.3328184458	5787/8192	0.706421
--0.2787358355	0.3351420819	11575/16384	0.706482
--0.2801620466	0.3358581611	1447/2048	0.706543
--0.2801035915	0.3357841732	11577/16384	0.706604
--0.2808037177	0.3356617776	5789/8192	0.706665
--0.2815857599	0.3369741436	11579/16384	0.706726
--0.2826811357	0.3373849159	1357/1920	0.706771
--0.2826792445	0.3374107079	2895/4096	0.706787
--0.2825648204	0.3373775291	475/672	0.706845
--0.282568184	0.3373791376	11581/16384	0.706848
--0.2825901918	0.3370205359	5791/8192	0.706909
--0.282594789	0.3370320664	1445/2044	0.706947
--0.282554939	0.3370498449	11583/16384	0.70697
--0.2825598969	0.3370513887	181/256	0.707031
--0.2825598969	0.3370513887	181/256	0.707031
--0.2825597209	0.337051079	11585/16384	0.707092
--0.2825628689	0.3370512727	5793/8192	0.707153
--0.282562869	0.3370512717	1403/1984	0.707157
--0.2825627188	0.3370507102	1437/2032	0.707185
--0.2825614936	0.3370583567	11587/16384	0.707214
--0.2825630579	0.3370590505	1447/2046	0.707234
--0.282549238	0.3370739047	2897/4096	0.707275
--0.2825540094	0.3370749827	11589/16384	0.707336
--0.2825538347	0.3370740852	481/680	0.707353
--0.2825024056	0.3370360398	5795/8192	0.707397
--0.2824971095	0.3368853593	11591/16384	0.707458
--0.2824388991	0.336888244	1449/2048	0.70752
--0.2824430104	0.3368902728	11593/16384	0.707581
--0.2824129171	0.3369173571	5797/8192	0.707642
--0.2824195697	0.3369184511	1087/1536	0.707682
--0.2823049833	0.3367490871	11595/16384	0.707703
--0.2828643872	0.3366827388	2899/4096	0.707764
--0.2828440328	0.3366573381	453/640	0.707812
--0.2828537606	0.3365687117	11597/16384	0.707825
--0.2828507671	0.3365752982	1427/2016	0.707837
--0.2841009504	0.3369340905	5799/8192	0.707886
--0.2840043148	0.3368610295	1447/2044	0.707926
--0.2841549576	0.3363907484	11599/16384	0.707947
--0.2841058385	0.3364376987	725/1024	0.708008
--0.2841058385	0.3364376987	725/1024	0.708008
--0.2841103292	0.336437657	11601/16384	0.708069
--0.2840886415	0.3364702153	5801/8192	0.70813
--0.2840886494	0.3364693965	1269/1792	0.708147
--0.2840953425	0.3364722226	1405/1984	0.708165
--0.2840953028	0.3364708341	1439/2032	0.708169
--0.2840221268	0.3364158975	11603/16384	0.708191
--0.2840073696	0.3364280122	483/682	0.708211
--0.283892289	0.3362278154	2901/4096	0.708252
--0.2838720787	0.3362779552	11605/16384	0.708313
--0.2838810036	0.3362764394	17/24	0.708333
--0.2849464794	0.3353133343	5803/8192	0.708374
--0.2845896363	0.3405450218	11607/16384	0.708435
--0.2865649389	0.3449953524	1451/2048	0.708496
--0.286667795	0.3443716157	11609/16384	0.708557
--0.2923346967	0.3512160849	5805/8192	0.708618
--0.2697717663	0.3515055614	11611/16384	0.708679
--0.2651936815	0.3289719817	2903/4096	0.70874
--0.2629655393	0.3304779268	11613/16384	0.708801
--0.259615602	0.324904293	1429/2016	0.708829
--0.2510871612	0.3230360092	1361/1920	0.708854
--0.251124943	0.3228986112	5807/8192	0.708862
--0.2520646509	0.3233475473	207/292	0.708904
--0.2514746719	0.3252720968	11615/16384	0.708923
--0.2516740869	0.3251184155	363/512	0.708984
--0.2516740869	0.3251184155	363/512	0.708984
--0.2516594618	0.3251143577	11617/16384	0.709045
--0.2518148386	0.3249225031	1441/2032	0.709154
--0.2519803422	0.3252573074	11619/16384	0.709167
--0.251978196	0.325256126	1407/1984	0.709173
--0.2521093776	0.3252006245	1451/2046	0.709189
--0.2522650002	0.3261243874	1271/1792	0.709263
--0.2525220389	0.3258771081	1447/2040	0.709314
--0.2495283373	0.3273092158	5811/8192	0.709351
--0.2411098072	0.3241394138	11623/16384	0.709412
--0.2396945946	0.3276221334	1453/2048	0.709473
--0.2399325068	0.3275114537	11625/16384	0.709534
--0.2288748193	0.3298035495	11627/16384	0.709656
--0.2435269709	0.2907126842	2907/4096	0.709717
--0.2367085459	0.2847189393	11629/16384	0.709778
--0.31848965	0.2667120256	5815/8192	0.709839
--0.3190014524	0.2586182129	1451/2044	0.709883
--0.3110229111	0.2431765603	1363/1920	0.709896
--0.3110448234	0.2430641461	11631/16384	0.7099
--0.3109443098	0.2452591209	727/1024	0.709961
--0.3109443098	0.2452591209	727/1024	0.709961
--0.3109848302	0.2451734898	11633/16384	0.710022
--0.3113509151	0.2461873252	5817/8192	0.710083
--0.3095286853	0.2461029198	1443/2032	0.710138
--0.308654768	0.2464260557	11635/16384	0.710144
--0.3074820172	0.2463244201	1453/2046	0.710166
--0.3033190337	0.2420197778	1409/1984	0.710181
--0.3020953141	0.2435520651	2909/4096	0.710205
--0.3024461103	0.2445556606	11637/16384	0.710266
--0.302512491	0.2444455902	1091/1536	0.710286
--0.2999252293	0.2449383845	483/680	0.710294
--0.3005821675	0.2196716138	5819/8192	0.710327
--0.2779315199	0.1970753268	11639/16384	0.710388
--0.2802532736	0.199375691	1455/2048	0.710449
--0.2802069876	0.1993087391	11641/16384	0.71051
--0.2812175085	0.1994933281	5821/8192	0.710571
--0.2809020715	0.2019026924	11643/16384	0.710632
--0.2811882422	0.2040766947	11645/16384	0.710754
--0.2814670301	0.2038584466	1433/2016	0.710813
--0.2814515308	0.203858822	1453/2044	0.710861
--0.2814395048	0.2038597404	91/128	0.710938
--0.2814395048	0.2038597404	91/128	0.710938
--0.281438838	0.2038621694	1445/2032	0.711122
--0.2814373208	0.2038636338	485/682	0.711144
--0.2814302995	0.2038656064	2913/4096	0.711182
--0.2814313721	0.2038661506	11653/16384	0.711243
--0.2814285657	0.2038708957	1451/2040	0.711275
--0.2814913357	0.2037375618	11655/16384	0.711365
--0.2814575562	0.203719734	1457/2048	0.711426
--0.2814586104	0.2037204199	11657/16384	0.711487
--0.2814586008	0.2037204255	1275/1792	0.711496
--0.281443288	0.2037259006	5829/8192	0.711548
--0.281444653	0.2037265699	1093/1536	0.711589
--0.2814192902	0.2036588872	11659/16384	0.711609
--0.2818608149	0.2038985972	2915/4096	0.71167
--0.2819150345	0.2038397874	11661/16384	0.711731
--0.2821971409	0.2054075425	5831/8192	0.711792
--0.2821892978	0.2054083166	205/288	0.711806
--0.282464559	0.205352056	1455/2044	0.71184
--0.2827109171	0.2052442227	11663/16384	0.711853
--0.2826686738	0.2052340182	729/1024	0.711914
--0.2826686738	0.2052340182	729/1024	0.711914
--0.2826697663	0.2052347672	1367/1920	0.711979
--0.2826523604	0.2052384167	5833/8192	0.712036
--0.2826530866	0.2051873584	11667/16384	0.712097
--0.2826532582	0.2051880383	1447/2032	0.712106
--0.2826602459	0.2051490116	47/66	0.712121
--0.2827334956	0.2050372135	2917/4096	0.712158
--0.2827349343	0.2050381146	1413/1984	0.712198
--0.2827128084	0.2050439175	11669/16384	0.712219
--0.2826889316	0.2049543498	1453/2040	0.712255
--0.2836254702	0.2053945003	5835/8192	0.71228
--0.2776516193	0.2074960092	1459/2048	0.712402
--0.2777126718	0.2074527276	11673/16384	0.712463
--0.2777208614	0.2084452823	5837/8192	0.712524
--0.2736319323	0.2083466209	11675/16384	0.712585
--0.2616677051	0.2014735211	2919/4096	0.712646
--0.2622841296	0.2021288591	11677/16384	0.712708
--0.2605574834	0.2065338349	5839/8192	0.712769
--0.2605400849	0.2064543468	479/672	0.712798
--0.2607276864	0.2063766748	1457/2044	0.712818
--0.2608862899	0.2062958466	11679/16384	0.71283
--0.26085914	0.2062882287	365/512	0.712891
--0.26085914	0.2062882287	365/512	0.712891
--0.2608485177	0.2062902387	5841/8192	0.713013
--0.2608485115	0.2062902399	1369/1920	0.713021
--0.2608505199	0.2062561086	11683/16384	0.713074
--0.2608450616	0.2062535273	1449/2032	0.713091
--0.2608538223	0.2062255091	1459/2046	0.713099
--0.2609208344	0.2061561414	2921/4096	0.713135
--0.2609058143	0.2061561245	11685/16384	0.713196
--0.2609058594	0.2061560256	1415/1984	0.713206
--0.2608919753	0.2060815343	97/136	0.713235
--0.2612769741	0.2064375081	5843/8192	0.713257
--0.2614862915	0.2080318954	11687/16384	0.713318
--0.2619623023	0.2078760435	1461/2048	0.713379
--0.2619472184	0.2078771939	11689/16384	0.71344
--0.2628214446	0.2080986658	11691/16384	0.713562
--0.2544539424	0.2119475922	2923/4096	0.713623
--0.2549114183	0.214230225	11693/16384	0.713684
--0.263089979	0.1584045885	5847/8192	0.713745
--0.2593192793	0.1462812353	1439/2016	0.71379
--0.2502153295	0.1390249987	1459/2044	0.713796
--0.2384545011	0.134470472	11695/16384	0.713806
--0.2395099496	0.1362467946	731/1024	0.713867
--0.2395099496	0.1362467946	731/1024	0.713867
--0.2395000557	0.136215561	11697/16384	0.713928
--0.2400605034	0.1365377406	5849/8192	0.713989
--0.23840163	0.1381574325	11699/16384	0.71405
--0.2384587365	0.1381836099	457/640	0.714063
--0.2370284297	0.1390595348	1451/2032	0.714075
--0.2353469174	0.1396468072	487/682	0.714076
--0.2295787132	0.1401008268	2925/4096	0.714111
--0.2301443092	0.1404463705	11701/16384	0.714172
--0.2301380748	0.1404051497	1097/1536	0.714193
--0.2287311502	0.1433946356	1417/1984	0.714214
--0.2262606599	0.1470604861	1457/2040	0.714216
--0.2065885025	0.0969074429	5851/8192	0.714233
-0.1899284194	0.0887180779	3511/4096	0.857178
-0.1940627485	0.0857970704	14045/16384	0.857239
-0.214234923	0.1254942105	7023/8192	0.8573
-0.2160384051	0.1227899894	583/680	0.857353
-0.2157722579	0.1228040516	1701/1984	0.857359
-0.2157724517	0.1228032724	14047/16384	0.857361
-0.2155777106	0.1228455123	439/512	0.857422
-0.2155777106	0.1228455123	439/512	0.857422
-0.2153472169	0.122642791	1753/2044	0.857632
-0.21524547	0.122598005	247/288	0.857639
-0.2151061167	0.1225970126	3513/4096	0.857666
-0.2151076373	0.122595574	1537/1792	0.857701
-0.2151107954	0.1226271524	14053/16384	0.857727
-0.2148760592	0.1221526629	585/682	0.857771
-0.2147931317	0.1217258183	1743/2032	0.857776
-0.2148782448	0.1207571931	7027/8192	0.857788
-0.2148491664	0.1208196606	549/640	0.857812
-0.2218030536	0.1212566074	14055/16384	0.857849
-0.2232415085	0.1194481133	1757/2048	0.85791
-0.2232485717	0.1194848495	14057/16384	0.857971
-0.2227763786	0.1192106052	7029/8192	0.858032
-0.2221549378	0.117512633	14059/16384	0.858093
-0.2402259081	0.1382068131	3515/4096	0.858154
-0.2434577256	0.1379997484	14061/16384	0.858215
-0.2214588437	0.1850116796	7031/8192	0.858276
-0.2382546043	0.1848937825	103/120	0.858333
-0.2382626373	0.185010065	14063/16384	0.858337
-0.237390741	0.1844253532	1703/1984	0.858367
-0.2373811557	0.184527879	879/1024	0.858398
-0.2373811557	0.184527879	879/1024	0.858398
-0.2372546339	0.1846699068	7033/8192	0.858521
-0.2367614782	0.1845971639	14067/16384	0.858582
-0.237267413	0.183323659	1755/2044	0.858611
-0.23700572	0.1828087255	577/672	0.858631
-0.2369584751	0.1828668901	3517/4096	0.858643
-0.2368405855	0.1829422066	14069/16384	0.858704
-0.2368506512	0.1829468688	1319/1536	0.858724
-0.238039036	0.1815673435	1757/2046	0.858749
-0.239353064	0.1809994398	1745/2032	0.85876
-0.2393123862	0.1808986396	7035/8192	0.858765
-0.247307262	0.1811379528	14071/16384	0.858826
-0.2440019956	0.1792189179	1649/1920	0.858854
-0.2440366265	0.1793043233	1759/2048	0.858887
-0.2440558111	0.1793025668	14073/16384	0.858948
-0.2439378181	0.1794557737	7037/8192	0.859009
-0.2436136578	0.1793835725	14075/16384	0.85907
-0.243234696	0.1791413256	55/64	0.859375
-0.243234696	0.1791413256	55/64	0.859375
-0.2432337097	0.179138196	1759/2046	0.859726
-0.2432347366	0.1791361303	1747/2032	0.859744
-0.2432500805	0.1791384795	1651/1920	0.859896
-0.2432500028	0.179138608	1541/1792	0.859933
-0.2432492123	0.1791375183	1321/1536	0.860026
-0.2431746692	0.1792891407	14095/16384	0.860291
-0.2431746891	0.1792891427	117/136	0.860294
-0.2431806058	0.1792840943	881/1024	0.860352
-0.2431806058	0.1792840943	881/1024	0.860352
-0.2431806204	0.179284093	1707/1984	0.860383
-0.2431813313	0.1792797283	14099/16384	0.860535
-0.2431898915	0.179284885	1759/2044	0.860568
-0.2431936781	0.179282656	3525/4096	0.860596
-0.2431936894	0.179282654	1735/2016	0.860615
-0.2431930198	0.1792817988	14101/16384	0.860657
-0.2432074825	0.1792897918	587/682	0.860704
-0.2432230812	0.1793023593	7051/8192	0.860718
-0.2432231118	0.1793024263	1749/2032	0.860728
-0.2427948524	0.1793656688	1763/2048	0.86084
-0.2428016313	0.1793645159	14105/16384	0.860901
-0.2428137543	0.1793760378	551/640	0.860938
-0.2425249626	0.1794975481	14107/16384	0.861023
-0.2427468657	0.1782418151	3527/4096	0.861084
-0.2426805504	0.1782812687	14109/16384	0.861145
-0.2423098616	0.177921599	7055/8192	0.861206
-0.2423171207	0.1779973777	14111/16384	0.861267
-0.2423170374	0.1779975139	1757/2040	0.861275
-0.2423223058	0.1779926449	441/512	0.861328
-0.2423223058	0.1779926449	441/512	0.861328
-0.2423222484	0.1779927661	1709/1984	0.861391
-0.2423229407	0.1779883752	14115/16384	0.861511
-0.2423311648	0.1779938751	1761/2044	0.861546
-0.2423351812	0.1779922453	193/224	0.861607
-0.2423466202	0.1780024132	1763/2046	0.861681
-0.2423540663	0.1780190875	7059/8192	0.861694
-0.2423537739	0.1780186325	1751/2032	0.861713
-0.2422718202	0.1780641112	14119/16384	0.861755
-0.2422716827	0.1781050592	1765/2048	0.861816
-0.2422710974	0.1781041722	14121/16384	0.861877
-0.2422816754	0.1781038631	7061/8192	0.861938
-0.2422811561	0.178103276	331/384	0.861979
-0.2423037975	0.1781187163	14123/16384	0.862
-0.2419708307	0.1782478244	3531/4096	0.862061
-0.2424575325	0.1762368281	7063/8192	0.862183
-0.2437425516	0.1744461688	14127/16384	0.862244
-0.2437607002	0.1744636847	1759/2040	0.862255
-0.2434059652	0.1743847013	883/1024	0.862305
-0.2434059652	0.1743847013	883/1024	0.862305
-0.243412136	0.17438287	14129/16384	0.862366
-0.243424883	0.1743940894	1711/1984	0.862399
-0.2433889237	0.1744461162	7065/8192	0.862427
-0.2431417726	0.1740045288	1763/2044	0.862524
-0.2429032767	0.1739138697	3533/4096	0.862549
-0.2429245313	0.1739218682	1739/2016	0.862599
-0.2428921353	0.1739743737	14133/16384	0.86261
-0.2427678489	0.1729356535	1765/2046	0.862659
-0.2433890342	0.1715075966	7067/8192	0.862671
-0.2431923314	0.1716516507	1753/2032	0.862697
-0.2465778001	0.1791522359	14135/16384	0.862732
-0.2536567413	0.179871806	1767/2048	0.862793
-0.2536261299	0.1789889783	7069/8192	0.862915
-0.2594098356	0.1770174372	1657/1920	0.863021
-0.2594693244	0.1771101096	3535/4096	0.863037
-0.259364626	0.1773044821	14141/16384	0.863098
-0.2585122096	0.1768767136	7071/8192	0.863159
-0.2585504561	0.1769678662	14143/16384	0.86322
-0.2585488745	0.1769662959	587/680	0.863235
-0.2585549427	0.1769589961	221/256	0.863281
-0.2585549427	0.1769589961	221/256	0.863281
-0.258553382	0.1769578667	1713/1984	0.863407
-0.2585539602	0.176952958	14147/16384	0.863464
-0.2585670962	0.1769567089	1765/2044	0.863503
-0.2585721124	0.1769534029	3537/4096	0.863525
-0.2585708588	0.1769523394	1741/2016	0.863591
-0.2585931528	0.1769624693	19/22	0.863636
-0.2586061779	0.1769850655	7075/8192	0.863647
-0.2586145136	0.176981892	1755/2032	0.863681
-0.2584957952	0.1770593266	14151/16384	0.863708
-0.2585009232	0.1771183132	1769/2048	0.86377
-0.2585158335	0.1771150969	7077/8192	0.863892
-0.2585148523	0.1771143178	1327/1536	0.863932
-0.2585503927	0.1771361041	14155/16384	0.863953
-0.2580892269	0.1771875524	3539/4096	0.864014
-0.2580600162	0.1760153582	7079/8192	0.864136
-0.2575528213	0.1757625334	14159/16384	0.864197
-0.2575693768	0.1757586952	1763/2040	0.864216
-0.2575859911	0.1758291233	14161/16384	0.864319
-0.2576004317	0.1758257779	1549/1792	0.864397
-0.2575995157	0.1758248187	1715/1984	0.864415
-0.2576259975	0.1758496893	14163/16384	0.864441
-0.2575669296	0.1759477744	83/96	0.864583
-0.2574514902	0.1760578993	1769/2046	0.864614
-0.2572811641	0.1761245538	7083/8192	0.864624
-0.2573039733	0.1761781682	1757/2032	0.864665
-0.2574977239	0.1741145168	14167/16384	0.864685
-0.2576371501	0.1719358927	1771/2048	0.864746
-0.2576633141	0.1720064194	14169/16384	0.864807
-0.2568984763	0.1718050598	7085/8192	0.864868
-0.2556875801	0.169599273	14171/16384	0.864929
-0.2709690571	0.1908388692	3543/4096	0.86499
-0.2738584001	0.1898739299	14173/16384	0.865051
-0.2723065808	0.2122250266	1661/1920	0.865104
-0.2716649367	0.2120610608	7087/8192	0.865112
-0.2757200854	0.2101682633	14175/16384	0.865173
-0.2754205524	0.2101983882	353/408	0.865196
-0.2752066031	0.209995136	443/512	0.865234
-0.2752066031	0.209995136	443/512	0.865234
-0.2752202468	0.2099946513	14177/16384	0.865295
-0.2751491083	0.2100815643	7089/8192	0.865356
-0.2749222346	0.2100532343	14179/16384	0.865417
-0.2749227441	0.2100511213	1717/1984	0.865423
-0.2750272492	0.2094441482	1769/2044	0.86546
-0.2749267982	0.2092757277	3545/4096	0.865479
-0.2749380545	0.2092779594	1551/1792	0.865513
-0.2748727486	0.2093402106	14181/16384	0.86554
-0.2746831745	0.2093552602	1745/2016	0.865575
-0.2753321057	0.2082805484	161/186	0.865591
-0.2760001147	0.2079828289	7091/8192	0.865601
-0.2763463979	0.2068601218	1759/2032	0.86565
-0.2787340132	0.2119243257	14183/16384	0.865662
-0.2814821373	0.2113863634	14185/16384	0.865784
-0.2819335023	0.2088746874	14187/16384	0.865906
-0.2836522352	0.2270508179	3547/4096	0.865967
-0.2867018458	0.2285855753	14189/16384	0.866028
-0.2438566791	0.2178148506	7095/8192	0.866089
-0.2170539166	0.2417740575	1663/1920	0.866146
-0.2172675672	0.2403782996	14191/16384	0.86615
-0.2210512114	0.243244564	589/680	0.866176
-0.2224501193	0.2417323231	887/1024	0.866211
-0.2224501193	0.2417323231	887/1024	0.866211
-0.2223231575	0.2417135594	14193/16384	0.866272
-0.2227926163	0.2409038338	7097/8192	0.866333
-0.2244529532	0.2403622519	14195/16384	0.866394
-0.225481357	0.2439499021	1719/1984	0.866431
-0.2261116548	0.2458011257	253/292	0.866438
-0.2272768313	0.2453888475	3549/4096	0.866455
-0.2276028513	0.2448104094	14197/16384	0.866516
-0.2275332135	0.2448001056	1331/1536	0.866536
-0.2305013966	0.2507370257	1747/2016	0.866567
-0.2263942876	0.2528267803	591/682	0.866569
-0.2275538044	0.2548592866	7099/8192	0.866577
-0.2166777736	0.2570567442	1761/2032	0.866634
-0.2118363496	0.2616974562	14199/16384	0.866638
-0.2132769752	0.2768374841	1775/2048	0.866699
-0.2128440093	0.276189493	14201/16384	0.86676
-0.2162828707	0.2748868355	7101/8192	0.866821
-0.2200233778	0.2750838345	14203/16384	0.866882
-0.2267833265	0.2760371378	3551/4096	0.866943
-0.226100747	0.27600696	14205/16384	0.867004
-0.2254815832	0.2743331748	7103/8192	0.867065
-0.2252282828	0.2746027806	14207/16384	0.867126
-0.2252865312	0.2746371692	1769/2040	0.867157
-0.2252880826	0.2746257111	111/128	0.867188
-0.2252880826	0.2746257111	111/128	0.867188
-0.2253243124	0.2746677219	1773/2044	0.867417
-0.2253292844	0.274660056	1721/1984	0.86744
-0.2253334293	0.2746542725	14213/16384	0.867493
-0.2253107497	0.2747370881	1775/2046	0.867546
-0.2253287619	0.2747489351	7107/8192	0.867554
-0.225328593	0.2747491578	583/672	0.86756
-0.2251717722	0.2747246693	14215/16384	0.867615
-0.2251717174	0.2747241438	1763/2032	0.867618
-0.2250478149	0.2748043645	1777/2048	0.867676
-0.2250529064	0.274799253	14217/16384	0.867737
-0.2250528081	0.2747993854	1555/1792	0.867746
-0.22507368	0.2748351476	7109/8192	0.867798
-0.2250763359	0.2748308957	1333/1536	0.867839
-0.2250851948	0.2749085925	14219/16384	0.867859
-0.224566845	0.2746747029	3555/4096	0.86792
-0.2244659733	0.2747459902	14221/16384	0.867981
-0.2249177794	0.2738775053	7111/8192	0.868042
-0.2249075178	0.2730264844	14223/16384	0.868103
-0.2246487777	0.2731156454	1771/2040	0.868137
-0.224683548	0.2731474482	889/1024	0.868164
-0.224683548	0.2731474482	889/1024	0.868164
-0.2246884452	0.2731429825	1667/1920	0.868229
-0.2246818733	0.273232914	14227/16384	0.868347
-0.2244754794	0.2732021674	1775/2044	0.868395
-0.2244967291	0.2732312414	3557/4096	0.868408
-0.2244999476	0.2732277673	1723/1984	0.868448
-0.2245116676	0.2732527016	14229/16384	0.868469
-0.2241837262	0.2730876561	1777/2046	0.868524
-0.2241185371	0.273179528	7115/8192	0.86853
-0.2241371039	0.2731830164	1751/2016	0.868552
-0.2246077217	0.2722441943	1765/2032	0.868602
-0.2258870834	0.2710097997	1779/2048	0.868652
-0.2258118419	0.2710555795	14233/16384	0.868713
-0.2256735863	0.2704852162	7117/8192	0.868774
-0.2262966289	0.2693550284	14235/16384	0.868835
-0.2294113777	0.2734243193	3559/4096	0.868896
-0.2298713723	0.2728255901	14237/16384	0.868958
-0.233734093	0.2733483018	7119/8192	0.869019
-0.2330643552	0.2721627863	14239/16384	0.86908
-0.2329408662	0.2723316287	591/680	0.869118
-0.2329656189	0.2723456872	445/512	0.869141
-0.2329656189	0.2723456872	445/512	0.869141
-0.2329895401	0.2723645137	7121/8192	0.869263
-0.2329895233	0.2723646459	1669/1920	0.869271
-0.2329883264	0.2724157885	14243/16384	0.869324
-0.2328161123	0.27242449	1777/2044	0.869374
-0.2328287503	0.2724421351	3561/4096	0.869385
-0.2328432033	0.2724587807	14245/16384	0.869446
-0.2328427195	0.2724586076	1725/1984	0.869456
-0.2326146642	0.2723344389	593/682	0.869501
-0.2325728313	0.2723624878	7123/8192	0.869507
-0.2325254969	0.2723980275	1753/2016	0.869544
-0.2327793638	0.2719150649	14247/16384	0.869568
-0.2326939792	0.2718816664	1767/2032	0.869587
-0.2325588453	0.2715123375	1781/2048	0.869629
-0.2325743964	0.2715267732	14249/16384	0.86969
-0.2324668715	0.2715858524	7125/8192	0.869751
-0.2322565642	0.2716053188	14251/16384	0.869812
-0.2328215748	0.2698457429	3563/4096	0.869873
-0.2324420286	0.2696134414	14253/16384	0.869934
-0.2366916801	0.2725782182	7127/8192	0.869995
-0.24050589	0.2783103697	14255/16384	0.870056
-0.2420458498	0.2765156468	355/408	0.870098
-0.2418891913	0.2764320522	891/1024	0.870117
-0.2418891913	0.2764320522	891/1024	0.870117
-0.2416443337	0.2762416092	7129/8192	0.870239
-0.2416578874	0.2757406372	14259/16384	0.8703
-0.2416224857	0.275769896	557/640	0.870313
-0.2434199298	0.2754813545	1779/2044	0.870352
-0.243326508	0.2753738162	3565/4096	0.870361
-0.2431327566	0.2752048375	14261/16384	0.870422
-0.2431230361	0.2752357277	1337/1536	0.870443
-0.2428901571	0.2747942359	1727/1984	0.870464
-0.2461346006	0.2765262547	1781/2046	0.870479
-0.2463767743	0.2763742849	7131/8192	0.870483
-0.2424880346	0.2812365188	14263/16384	0.870544
-0.2407865387	0.2850262426	1769/2032	0.870571
-0.2404814499	0.2938901609	1783/2048	0.870605
-0.2403573011	0.2927290485	14265/16384	0.870667
-0.2456515708	0.2931678446	7133/8192	0.870728
-0.2515740619	0.2948167742	14267/16384	0.870789
-0.2694938397	0.3058870686	3567/4096	0.87085
-0.2679284272	0.3016194293	14269/16384	0.870911
-0.2687796231	0.2895704694	7135/8192	0.870972
-0.2648276098	0.2932761156	14271/16384	0.871033
-0.2655474876	0.2932131285	1777/2040	0.871078
-0.265530791	0.2932379522	223/256	0.871094
-0.265530791	0.2932379522	223/256	0.871094
-0.2658498878	0.2933888837	1781/2044	0.871331
-0.2658294866	0.2934040358	3569/4096	0.871338
-0.2658306904	0.2934060828	1673/1920	0.871354
-0.2658445658	0.293351684	14277/16384	0.871399
-0.2658238449	0.2939848293	1783/2046	0.871457
-0.2658072115	0.2939279945	7139/8192	0.87146
-0.265797097	0.2939231806	1729/1984	0.871472
-0.2651766052	0.2935742534	14279/16384	0.871521
-0.265185409	0.2935843477	251/288	0.871528
-0.263842845	0.2938177	1771/2032	0.871555
-0.264280754	0.2941705399	1785/2048	0.871582
-0.2642976924	0.2941253914	14281/16384	0.871643
-0.2644608262	0.2943162453	7141/8192	0.871704
-0.2644670743	0.2942840154	1339/1536	0.871745
-0.2645223809	0.2947085066	14283/16384	0.871765
-0.262238508	0.2935079823	3571/4096	0.871826
-0.2643895771	0.2905685134	7143/8192	0.871948
-0.2600425947	0.2869954098	14287/16384	0.872009
-0.2603102211	0.2882822784	593/680	0.872059
-0.2602870336	0.2882651453	893/1024	0.87207
-0.2602870336	0.2882651453	893/1024	0.87207
-0.2604080816	0.288245894	7145/8192	0.872192
-0.2604051892	0.2882481281	1563/1792	0.87221
-0.2605281756	0.2883945213	14291/16384	0.872253
-0.2601727569	0.2888915873	1783/2044	0.872309
-0.2601565126	0.2888726737	3573/4096	0.872314
-0.2602496428	0.2888649608	14293/16384	0.872375
-0.2602429035	0.2888541499	335/384	0.872396
-0.2591575786	0.2894303144	595/682	0.872434
-0.2592204722	0.2893896467	7147/8192	0.872437
-0.2593827699	0.2896538593	1731/1984	0.87248
-0.2594946894	0.2874506141	14295/16384	0.872498
-0.2585373182	0.2866267389	1759/2016	0.87252
-0.2592142573	0.2846702568	1773/2032	0.872539
-0.2589085714	0.284728915	1787/2048	0.872559
-0.2589356592	0.2848232536	14297/16384	0.87262
-0.258387834	0.284653522	7149/8192	0.872681
-0.2580987503	0.2838420965	14299/16384	0.872742
-0.2623566048	0.2821427031	3575/4096	0.872803
-0.2607993748	0.2813591181	14301/16384	0.872864
-0.2593955711	0.277227735	7151/8192	0.872925
-0.2578317005	0.2785210644	14303/16384	0.872986
-0.2582184583	0.2789558811	1781/2040	0.873039
-0.2586189934	0.2792732094	255/292	0.873288
-0.2586225067	0.2792736684	3577/4096	0.873291
-0.2586135801	0.2792767155	1565/1792	0.873326
-0.25862256	0.2792233053	14309/16384	0.873352
-0.2588475431	0.2796275868	1787/2046	0.873412
-0.2588464594	0.2796320838	7155/8192	0.873413
-0.2588506837	0.2796013075	559/640	0.873437
-0.2583254406	0.2798968126	14311/16384	0.873474
-0.2584370995	0.280000103	1733/1984	0.873488
-0.2584771949	0.2803635084	587/672	0.873512
-0.2585610057	0.280328403	1775/2032	0.873524
-0.2585466714	0.2803205746	1789/2048	0.873535
-0.2585370248	0.2803097422	14313/16384	0.873596
-0.2586178894	0.2802909006	7157/8192	0.873657
-0.2587484351	0.2803463924	14315/16384	0.873718
-0.2581840787	0.2807443441	3579/4096	0.873779
-0.2582100982	0.2808252674	14317/16384	0.87384
-0.2574693592	0.280311241	7159/8192	0.873901
-0.2569202667	0.2812136383	14319/16384	0.873962
-0.2574910453	0.2811166225	1787/2044	0.874266
-0.2574801532	0.2811074547	1343/1536	0.874349
-0.2575928103	0.2811509782	1789/2046	0.874389
-0.2577095086	0.2814259052	1679/1920	0.874479
-0.2577824872	0.2812605867	1735/1984	0.874496
-0.2577589513	0.2812494351	1763/2016	0.874504
-0.2577091344	0.2811986261	7/8	0.875
-0.2577091344	0.2811986261	7/8	0.875
-0.2577132391	0.281159848	337/384	0.877604
-0.2577874673	0.2811234109	1795/2044	0.87818
-0.2577848917	0.2811238959	1349/1536	0.878255
-0.2577509482	0.2812525588	1785/2032	0.878445
-0.2577589513	0.2812494351	253/288	0.878472
-0.2577824872	0.2812605867	1743/1984	0.878528
-0.2577095086	0.2814259052	1687/1920	0.878646
-0.2578758982	0.2813352324	1799/2046	0.879277
-0.2578708206	0.2813316302	1787/2032	0.879429
-0.2578710031	0.2813316003	197/224	0.879464
-0.2578708693	0.281332532	1745/1984	0.879536
-0.2578709905	0.2813324889	1351/1536	0.879557
-0.2578907549	0.28130468	1577/1792	0.880022
-0.2578861647	0.2813034424	257/292	0.880137
-0.2578807355	0.2812980708	1801/2046	0.880254
-0.2579431207	0.2812791225	1789/2032	0.880413
-0.2579402005	0.2812810825	1775/2016	0.880456
-0.2579334633	0.2812650636	1747/1984	0.880544
-0.2577095086	0.2814259052	1691/1920	0.880729
-0.2578325759	0.2816720534	1801/2044	0.881115
-0.2578326454	0.2816725028	1579/1792	0.881138
-0.2578565096	0.2816668432	601/682	0.881232
-0.2578969353	0.2817480241	1791/2032	0.881398
-0.257891441	0.2817419119	1777/2016	0.881448
-0.257919809	0.2817126069	1749/1984	0.881552
-0.2577095086	0.2814259052	1693/1920	0.881771
-0.2573736473	0.2813590893	7225/8192	0.881958
-0.2572154701	0.2814916903	3613/4096	0.88208
-0.2572151651	0.2814919236	1803/2044	0.882094
-0.257234513	0.2814928796	1355/1536	0.882161
-0.2570423098	0.2815541621	7227/8192	0.882202
-0.2570417789	0.2815535487	1805/2046	0.882209
-0.256415157	0.2814379257	1793/2032	0.882382
-0.2565622483	0.281539213	593/672	0.88244
-0.2565592085	0.281525056	7229/8192	0.882446
-0.2567269287	0.2817486529	1751/1984	0.88256
-0.2567092857	0.2817399838	3615/4096	0.882568
-0.2566748961	0.281718467	14461/16384	0.882629
-0.2566836776	0.2816821941	14463/16384	0.882751
-0.2566845844	0.2816855549	1807/2046	0.883187
-0.2566795534	0.2816826537	1781/2016	0.883433
-0.2566796662	0.2816825911	1357/1536	0.883464
-0.2566764604	0.2816717713	1753/1984	0.883569
-0.2567053774	0.2816570686	601/680	0.883824
-0.2567011259	0.2816550434	1807/2044	0.884051
-0.256697563	0.2816472649	603/682	0.884164
-0.2567534929	0.2816618183	14489/16384	0.884338
-0.2567536072	0.2816618731	1797/2032	0.88435
-0.2567624829	0.2816535692	1783/2016	0.884425
-0.2567269287	0.2817486529	1755/1984	0.884577
-0.2567395018	0.2817514284	14493/16384	0.884583
-0.2567937645	0.2818118158	14495/16384	0.884705
-0.2567873989	0.2818177434	453/512	0.884766
-0.2567873989	0.2818177434	453/512	0.884766
-0.2567873694	0.2818177306	361/408	0.884804
-0.2567875366	0.2818186489	1699/1920	0.884896
-0.2567863679	0.2818196051	14499/16384	0.884949
-0.2567829317	0.2818163775	3625/4096	0.88501
-0.256782902	0.2818163854	1809/2044	0.885029
-0.2567812047	0.281809362	7251/8192	0.885132
-0.2567812531	0.2818093315	1811/2046	0.885142
-0.2568002907	0.2817979121	1813/2048	0.885254
-0.2568003201	0.2817985532	14505/16384	0.885315
-0.2568004038	0.2817985195	1799/2032	0.885335
-0.2567971359	0.2817971265	7253/8192	0.885376
-0.2567972216	0.2817975461	85/96	0.885417
-0.256838593	0.281774613	14509/16384	0.885559
-0.2568341409	0.2817753541	1757/1984	0.885585
-0.256778174	0.2821251103	1807/2040	0.885784
-0.2567784241	0.2821097739	7257/8192	0.885864
-0.2567963721	0.2820976078	567/640	0.885938
-0.2568605716	0.2821518614	3629/4096	0.885986
-0.2568611186	0.2821520825	1811/2044	0.886008
-0.2568596559	0.282138375	14517/16384	0.886047
-0.2568581503	0.2821392753	1361/1536	0.886068
-0.2569460258	0.2823319981	1813/2046	0.886119
-0.2562787943	0.2816752875	14521/16384	0.886292
-0.2562716511	0.2816963723	1801/2032	0.886319
-0.2559431352	0.2816973472	7261/8192	0.886353
-0.2557123012	0.2817198649	1787/2016	0.886409
-0.2555898649	0.2814766506	14523/16384	0.886414
-0.2555717404	0.2804413301	14525/16384	0.886536
-0.2550034715	0.2806728725	1759/1984	0.886593
-0.2550306777	0.280636904	7263/8192	0.886597
-0.2552087386	0.280639644	14527/16384	0.886658
-0.2551939284	0.2806141827	227/256	0.886719
-0.2551939284	0.2806141827	227/256	0.886719
-0.2552008656	0.2806010178	1703/1920	0.886979
-0.2552009749	0.2806010953	259/292	0.886986
-0.2552248295	0.2806001583	55/62	0.887097
-0.2551998805	0.280636788	14535/16384	0.887146
-0.2552422742	0.2806733748	1817/2048	0.887207
-0.2552398154	0.2806694673	1803/2032	0.887303
-0.2552490127	0.2806647703	7269/8192	0.887329
-0.2552476025	0.2806644778	1363/1536	0.88737
-0.255267255	0.2806608744	1789/2016	0.887401
-0.2552077892	0.2807903393	3635/4096	0.887451
-0.2552289072	0.2808125555	14541/16384	0.887512
-0.2550034715	0.2806728725	1761/1984	0.887601
-0.2545413174	0.2807328263	14543/16384	0.887634
-0.254761772	0.2807746881	909/1024	0.887695
-0.254761772	0.2807746881	909/1024	0.887695
-0.254761279	0.2807760295	1811/2040	0.887745
-0.2547705379	0.2807631506	7273/8192	0.887817
-0.2547704607	0.2807635322	1591/1792	0.887835
-0.2548080558	0.2808328763	3637/4096	0.887939
-0.2548076717	0.2808338195	1815/2044	0.887965
-0.2548133451	0.2808242339	14549/16384	0.888
-0.2548120367	0.2808240987	341/384	0.888021
-0.2548154329	0.2809640504	7275/8192	0.888062
-0.2548122132	0.2809639298	1817/2046	0.888074
-0.2539545508	0.2801284983	1819/2048	0.888184
-0.2539813269	0.2801713538	14553/16384	0.888245
-0.2536476536	0.2802068198	7277/8192	0.888306
-0.2531123694	0.2796596692	14555/16384	0.888367
-0.2557863575	0.2794062952	14557/16384	0.888489
-0.2574428035	0.2804180509	7279/8192	0.88855
-0.2584370995	0.280000103	1763/1984	0.888609
-0.2583441486	0.2799716104	14559/16384	0.888611
-0.2581222273	0.2795553435	455/512	0.888672
-0.2581222273	0.2795553435	455/512	0.888672
-0.2581247794	0.2795586958	1813/2040	0.888725
-0.2579636267	0.2795729063	14563/16384	0.888855
-0.2577655082	0.2793022461	3641/4096	0.888916
-0.2577679478	0.2793010582	1817/2044	0.888943
-0.2577726196	0.2792984092	1593/1792	0.888951
-0.2577723725	0.2793443965	14565/16384	0.888977
-0.2574893096	0.2790572454	7283/8192	0.889038
-0.2574928327	0.2790601509	1819/2046	0.889052
-0.2574959685	0.2790838698	569/640	0.889062
-0.2579236023	0.2786150073	14567/16384	0.889099
-0.2574121039	0.2782513825	1821/2048	0.88916
-0.2574301151	0.2782557776	14569/16384	0.889221
-0.2573867509	0.2782946124	1807/2032	0.889272
-0.2573604815	0.2783339584	7285/8192	0.889282
-0.2571948534	0.2783783251	14571/16384	0.889343
-0.2571851598	0.2777973533	1793/2016	0.889385
-0.2574398244	0.2773539092	3643/4096	0.889404
-0.2572931693	0.2772744628	14573/16384	0.889465
-0.2591051304	0.277734409	7287/8192	0.889526
-0.2619410369	0.2741298121	14575/16384	0.889587
-0.2590027233	0.2729178638	1765/1984	0.889617
-0.2591989935	0.2736748276	911/1024	0.889648
-0.2591989935	0.2736748276	911/1024	0.889648
-0.2592766801	0.2737087459	121/136	0.889706
-0.2589858838	0.2740423731	7289/8192	0.889771
-0.2588047845	0.274827508	14579/16384	0.889832
-0.2582938655	0.2752481035	3645/4096	0.889893
-0.2582928015	0.2752369064	1819/2044	0.889922
-0.2583516159	0.2752539267	14581/16384	0.889954
-0.2583489828	0.2752466535	1367/1536	0.889974
-0.2579057462	0.2754095271	7291/8192	0.890015
-0.2579165075	0.2754072593	607/682	0.890029
-0.2575825507	0.2748256055	14583/16384	0.890076
-0.2567341638	0.2750591223	1709/1920	0.890104
-0.2571412137	0.2755835853	1823/2048	0.890137
-0.257203691	0.2755784759	14585/16384	0.890198
-0.2573530703	0.2754957137	1809/2032	0.890256
-0.2573525026	0.2754974762	7293/8192	0.890259
-0.2574131462	0.275534371	14587/16384	0.89032
-0.2574985636	0.2756405741	1795/2016	0.890377
-0.2574995491	0.2756436069	3647/4096	0.890381
-0.2574722732	0.2756133401	14589/16384	0.890442
-0.2574857688	0.2755779277	7295/8192	0.890503
-0.257477808	0.2755861133	57/64	0.890625
-0.257477808	0.2755861133	57/64	0.890625
-0.2574771616	0.2755880975	1823/2046	0.891007
-0.2574730278	0.2755855442	1597/1792	0.891183
-0.2574730029	0.2755862968	1811/2032	0.89124
-0.257473077	0.2755862446	1369/1536	0.891276
-0.2574693893	0.2755780205	599/672	0.891369
-0.2574918149	0.2755630023	107/120	0.891667
-0.2574880846	0.2755618555	1823/2044	0.891879
-0.2574840131	0.2755559129	7307/8192	0.891968
-0.2574841947	0.2755561923	1825/2046	0.891984
-0.2574980253	0.2755614851	14615/16384	0.892029
-0.2575373114	0.2755635897	1827/2048	0.89209
-0.2575343764	0.2755605466	571/640	0.892188
-0.2575436617	0.2755539754	7309/8192	0.892212
-0.2575438388	0.2755539922	1813/2032	0.892224
-0.2575703948	0.2755551901	14619/16384	0.892273
-0.2574874301	0.2756215474	3655/4096	0.892334
-0.2574875276	0.2756231325	257/288	0.892361
-0.2575433908	0.2757692954	7311/8192	0.892456
-0.2575645431	0.2757016414	14623/16384	0.892517
-0.2575566897	0.2757059259	457/512	0.892578
-0.2575568099	0.2757058739	1771/1984	0.892641
-0.2575568078	0.2757058768	607/680	0.892647
-0.2575556034	0.2757072196	14627/16384	0.892761
-0.2575534148	0.2757041797	25/28	0.892857
-0.2575616673	0.2757039318	14631/16384	0.893005
-0.2575707972	0.275691297	1829/2048	0.893066
-0.2575707713	0.2756918211	14633/16384	0.893127
-0.2575682588	0.275690195	7317/8192	0.893188
-0.2575683222	0.2756901705	1815/2032	0.893209
-0.2575682791	0.2756905464	343/384	0.893229
-0.2575660401	0.2756858693	14635/16384	0.89325
-0.2576082337	0.2756869035	3659/4096	0.893311
-0.2576064239	0.2756877074	1801/2016	0.893353
-0.2576099778	0.2756766181	14637/16384	0.893372
-0.2575494941	0.2757392496	7319/8192	0.893433
-0.2573513872	0.275851921	14639/16384	0.893494
-0.2574564949	0.2759125621	915/1024	0.893555
-0.2574564949	0.2759125621	915/1024	0.893555
-0.2574549363	0.2759121826	1823/2040	0.893627
-0.2574540919	0.2759094048	1773/1984	0.893649
-0.2574621073	0.2759054606	7321/8192	0.893677
-0.2574768013	0.2759066339	14643/16384	0.893738
-0.2574860412	0.2759595731	3661/4096	0.893799
-0.2574846171	0.2759589784	261/292	0.893836
-0.2574914532	0.275952756	14645/16384	0.89386
-0.2574903665	0.2759525549	1373/1536	0.89388
-0.2574299424	0.2760713696	7323/8192	0.893921
-0.257433573	0.276067436	59/66	0.893939
-0.2573945359	0.2758790572	14647/16384	0.893982
-0.2572786466	0.2755578051	1831/2048	0.894043
-0.2572236492	0.2755545371	14649/16384	0.894104
-0.2570898693	0.2756988479	7325/8192	0.894165
-0.2570962522	0.2757004281	1817/2032	0.894193
-0.2569743248	0.2757293249	14651/16384	0.894226
-0.2567341638	0.2750591223	1717/1920	0.894271
-0.2564109446	0.2757008784	3663/4096	0.894287
-0.2566664325	0.2757137542	601/672	0.894345
-0.2567597899	0.2758418797	7327/8192	0.894409
-0.25675075	0.27579323	14655/16384	0.89447
-0.256744369	0.2757987361	229/256	0.894531
-0.256744369	0.2757987361	229/256	0.894531
-0.2567444544	0.2757986488	365/408	0.894608
-0.2567445205	0.2757993989	1775/1984	0.894657
-0.2567408259	0.2757979249	1829/2044	0.894814
-0.2567387342	0.2757920042	7331/8192	0.894897
-0.2567387895	0.2757922487	1831/2046	0.894917
-0.2567486247	0.2757959403	14663/16384	0.894958
-0.256756372	0.2757830566	1833/2048	0.89502
-0.2567515994	0.275777197	14667/16384	0.895203
-0.2567876337	0.2757867481	3667/4096	0.895264
-0.2567858846	0.2757845446	573/640	0.895312
-0.2567924042	0.2757808567	14669/16384	0.895325
-0.256792062	0.2757813159	1805/2016	0.895337
-0.2567495836	0.2758261166	7335/8192	0.895386
-0.2568075695	0.2759288238	14671/16384	0.895447
-0.2568051338	0.2758828207	917/1024	0.895508
-0.2568051338	0.2758828207	917/1024	0.895508
-0.2568052626	0.2758832813	609/680	0.895588
-0.2568026067	0.275882017	7337/8192	0.89563
-0.2568026742	0.2758820047	1605/1792	0.895647
-0.2568016545	0.275877897	14675/16384	0.895691
-0.2568130107	0.2758713481	3669/4096	0.895752
-0.2568130671	0.2758716862	1831/2044	0.895793
-0.2568365546	0.2758646041	7339/8192	0.895874
-0.2568355764	0.2758650018	611/682	0.895894
-0.2568044737	0.2759069992	14679/16384	0.895935
-0.2567941514	0.2760653434	1835/2048	0.895996
-0.2567947733	0.2760571555	14681/16384	0.896057
-0.2568399973	0.2760820443	7341/8192	0.896118
-0.2568370567	0.2760749542	1821/2032	0.896161
-0.2568827975	0.2761836752	14683/16384	0.896179
-0.2565776956	0.2757318568	3671/4096	0.89624
-0.2561020856	0.2758765947	1807/2016	0.896329
-0.2567341638	0.2750591223	1721/1920	0.896354
-0.2558373096	0.2742768425	7343/8192	0.896362
-0.2553399301	0.2753207621	14687/16384	0.896423
-0.2554734293	0.2752364249	459/512	0.896484
-0.2554734293	0.2752364249	459/512	0.896484
-0.2554715645	0.2752380892	1829/2040	0.896569
-0.2554915121	0.2752149127	14691/16384	0.896667
-0.2554915074	0.2752152663	1779/1984	0.896673
-0.2555300573	0.2752640318	3673/4096	0.896729
-0.2555284687	0.2752640956	1607/1792	0.896763
-0.2555283298	0.275264708	1833/2044	0.896771
-0.2555320414	0.275255533	14693/16384	0.89679
-0.2555440229	0.2753633734	7347/8192	0.896851
-0.2555428779	0.2753591101	1835/2046	0.896872
-0.2553865234	0.2752665646	14695/16384	0.896912
-0.2552240253	0.2755213281	1837/2048	0.896973
-0.2552248448	0.275510535	14697/16384	0.897034
-0.2552774747	0.2755403371	7349/8192	0.897095
-0.2552835779	0.2755202325	1823/2032	0.897146
-0.2553335104	0.2756229428	14699/16384	0.897156
-0.2543511236	0.2755536455	3675/4096	0.897217
-0.2556507294	0.2747525703	7351/8192	0.897339
-0.2567341638	0.2750591223	1723/1920	0.897396
-0.2574118956	0.275016445	14703/16384	0.8974
-0.2582670461	0.2746279287	919/1024	0.897461
-0.2582670461	0.2746279287	919/1024	0.897461
-0.2582265087	0.2746195911	1831/2040	0.897549
-0.2583866916	0.2743738695	7353/8192	0.897583
-0.2583190838	0.2735544438	14707/16384	0.897644
-0.2590027233	0.2729178638	1781/1984	0.897681
-0.2588101532	0.272270289	3677/4096	0.897705
-0.2588383308	0.2723141456	1835/2044	0.89775
-0.258652886	0.2723476033	14709/16384	0.897766
-0.2586708006	0.2723608434	1379/1536	0.897786
-0.2602276787	0.2709537624	7355/8192	0.897827
-0.260102883	0.2709799497	167/186	0.897849
-0.2608564346	0.2738081531	14711/16384	0.897888
-0.2667447014	0.2748521876	1839/2048	0.897949
-0.2652870344	0.2720028425	7357/8192	0.898071
-0.2650336625	0.2711033639	1825/2032	0.89813
-0.2649635113	0.2711181353	14715/16384	0.898132
-0.2647896272	0.2690962526	3679/4096	0.898193
-0.2648124028	0.2697888507	14717/16384	0.898254
-0.264444611	0.2701369487	1811/2016	0.898313
-0.2644399539	0.2701402316	7359/8192	0.898315
-0.2646236431	0.2701206456	14719/16384	0.898376
-0.2646034168	0.2700977683	115/128	0.898438
-0.2646034168	0.2700977683	115/128	0.898438
-0.2646042069	0.2700862504	1783/1984	0.89869
-0.2646041319	0.2700869369	1837/2044	0.898728
-0.2646205913	0.2700769702	613/682	0.898827
-0.2646569223	0.2701317394	1611/1792	0.898996
-0.26466103	0.2701227762	7365/8192	0.899048
-0.2646598992	0.2701230629	1381/1536	0.899089
-0.2646754407	0.2701129846	14731/16384	0.899109
-0.2646756032	0.2701130001	1827/2032	0.899114
-0.2646531905	0.2702435744	3683/4096	0.89917
-0.2646761677	0.2702591655	14733/16384	0.899231
-0.2645313504	0.2701241782	7367/8192	0.899292
-0.26452995	0.270125192	259/288	0.899306
-0.2641295404	0.2702223205	14735/16384	0.899353
-0.2643019729	0.2702816465	921/1024	0.899414
-0.2643019729	0.2702816465	921/1024	0.899414
-0.2643003315	0.2702817769	1727/1920	0.899479
-0.2642988021	0.270279505	367/408	0.89951
-0.2643055321	0.2702734109	7369/8192	0.899536
-0.2643201707	0.270271885	14739/16384	0.899597
-0.2643380757	0.270314764	3685/4096	0.899658
-0.2643368919	0.2703149228	1785/1984	0.899698
-0.2643359219	0.2703130603	1839/2044	0.899706
-0.2643402972	0.2703085873	14741/16384	0.899719
-0.2643487214	0.2704063597	7371/8192	0.89978
-0.2643528856	0.270398149	1841/2046	0.899804
-0.2642307998	0.2702776166	14743/16384	0.899841
-0.2637774812	0.2700174587	1843/2048	0.899902
-0.2637961779	0.2700301705	14745/16384	0.899963
-0.2636605844	0.2700980958	7373/8192	0.900024
-0.2633590209	0.2699631476	14747/16384	0.900085
-0.2633762787	0.2700126249	1829/2032	0.900098
-0.264650218	0.2696633098	3687/4096	0.900146
-0.2650338267	0.2667495263	7375/8192	0.900269
-0.2644637594	0.2676929148	605/672	0.900298
-0.2640413294	0.2679772964	14751/16384	0.90033
-0.2642039624	0.2679384741	461/512	0.900391
-0.2642039624	0.2679384741	461/512	0.900391
-0.2641988568	0.2679369894	1837/2040	0.90049
-0.2642058909	0.2679276424	1729/1920	0.900521
-0.2642240988	0.2679213824	14755/16384	0.900574
-0.2642516555	0.2679760924	3689/4096	0.900635
-0.2642484723	0.2679736702	263/292	0.900685
-0.2642549365	0.2679683511	14757/16384	0.900696
-0.2642550291	0.2679685287	1787/1984	0.900706
-0.2642356675	0.2680748958	7379/8192	0.900757
-0.2642432371	0.2680684719	1843/2046	0.900782
-0.2641348367	0.2679568506	14759/16384	0.900818
-0.2639276681	0.2681191246	1845/2048	0.900879
-0.2639295629	0.2681114414	14761/16384	0.90094
-0.263963467	0.2681428802	7381/8192	0.901001
-0.2639838235	0.268217768	14763/16384	0.901062
-0.264001761	0.2682156702	1831/2032	0.901083
-0.2633230304	0.268068539	3691/4096	0.901123
-0.2632746021	0.2682199796	14765/16384	0.901184
-0.2643549436	0.2674834958	7383/8192	0.901245
-0.2646170162	0.2654946984	1817/2016	0.90129
-0.2691384834	0.267913528	14767/16384	0.901306
-0.2680299148	0.2644391303	923/1024	0.901367
-0.2680299148	0.2644391303	923/1024	0.901367
-0.2680754967	0.2645829625	613/680	0.901471
-0.2678370737	0.264562592	7385/8192	0.901489
-0.2674849134	0.2643955661	14771/16384	0.90155
-0.2674992605	0.2644258705	577/640	0.901563
-0.2677407667	0.262945666	3693/4096	0.901611
-0.2677837952	0.2630938021	1843/2044	0.901663
-0.2675533222	0.2630822082	14773/16384	0.901672
-0.2675791213	0.2630929514	1385/1536	0.901693
-0.2671384705	0.2631789531	1789/1984	0.901714
-0.2707696981	0.2604138823	7387/8192	0.901733
-0.2699914828	0.2603127912	615/682	0.90176
-0.2691415395	0.2655064668	14775/16384	0.901794
-0.2665231491	0.2718175597	1847/2048	0.901855
-0.2668291991	0.2718714218	14777/16384	0.901917
-0.2675788391	0.2778134027	1833/2032	0.902067
-0.262250973	0.2808310155	3695/4096	0.9021
-0.2639656525	0.2817018142	14781/16384	0.902161
-0.2640106078	0.2871505513	7391/8192	0.902222
-0.2662649095	0.2843208726	1819/2016	0.902282
-0.266266435	0.284302657	14783/16384	0.902283
-0.2658927098	0.2844951095	231/256	0.902344
-0.2658927098	0.2844951095	231/256	0.902344
-0.2658953027	0.2845049992	1841/2040	0.902451
-0.2657085399	0.2844464443	3697/4096	0.902588
-0.2657077398	0.284445646	1733/1920	0.902604
-0.2657075241	0.284454277	1845/2044	0.902642
-0.2657076578	0.2844751823	14789/16384	0.902649
-0.2656474328	0.2841615466	7395/8192	0.90271
-0.2656528051	0.2841625348	1791/1984	0.902722
-0.2656313527	0.2841550642	1847/2046	0.902737
-0.2663956296	0.2837521275	1849/2048	0.902832
-0.2663979475	0.2837764008	14793/16384	0.902893
-0.2662772902	0.2837218616	7397/8192	0.902954
-0.2662812641	0.2837377545	1387/1536	0.902995
-0.2661619529	0.2835448889	14795/16384	0.903015
-0.2665562275	0.2835810161	1835/2032	0.903051
-0.2676918172	0.2835039498	3699/4096	0.903076
-0.2677427281	0.2831883639	14797/16384	0.903137
-0.2669410757	0.2861143799	7399/8192	0.903198
-0.2738433785	0.2876349214	14799/16384	0.903259
-0.2728258909	0.286766511	607/672	0.903274
-0.272062877	0.2861564229	925/1024	0.90332
-0.272062877	0.2861564229	925/1024	0.90332
-0.2720270271	0.2862187835	1843/2040	0.903431
-0.2719792942	0.2862887082	7401/8192	0.903442
-0.2719790863	0.2862839825	1619/1792	0.90346
-0.2717351042	0.2862620913	14803/16384	0.903503
-0.2716358563	0.2855286159	3701/4096	0.903564
-0.271607094	0.2855688931	1847/2044	0.90362
-0.2715728865	0.2856176634	14805/16384	0.903625
-0.2715876249	0.2856190683	347/384	0.903646
-0.2718978359	0.2843289774	7403/8192	0.903687
-0.2717739749	0.2842740532	1849/2046	0.903715
-0.2715710087	0.2843063556	1793/1984	0.90373
-0.2732545524	0.2860269561	14807/16384	0.903748
-0.2780556133	0.2889381285	1851/2048	0.903809
-0.2778266594	0.2888670591	14809/16384	0.90387
-0.2789376253	0.2880164666	7405/8192	0.903931
-0.2811425184	0.2886354426	14811/16384	0.903992
-0.2763032717	0.2933380133	1837/2032	0.904035
-0.2735682395	0.2970445112	3703/4096	0.904053
-0.2760530716	0.2998130101	14813/16384	0.904114
-0.2760564924	0.3195410401	7407/8192	0.904175
-0.2904622002	0.3145777773	14815/16384	0.904236
-0.2862517229	0.3133910914	1823/2016	0.904266
-0.2865590166	0.3140535936	463/512	0.904297
-0.2865590166	0.3140535936	463/512	0.904297
-0.2864349684	0.3144008209	123/136	0.904412
-0.2865993691	0.3143686659	7409/8192	0.904419
-0.286181179	0.3145943641	14819/16384	0.90448
-0.2853589159	0.3134577852	3705/4096	0.904541
-0.2854089647	0.3134459888	1621/1792	0.904576
-0.2851988747	0.3136909072	1849/2044	0.904599
-0.2853212312	0.3136858884	14821/16384	0.904602
-0.2853601219	0.3116016677	7411/8192	0.904663
-0.2852562637	0.3117659797	579/640	0.904687
-0.2850089218	0.3111544354	617/682	0.904692
-0.2873991962	0.3126067411	14823/16384	0.904724
-0.2875265156	0.3125134117	1795/1984	0.904738
-0.2920976325	0.3087448218	1853/2048	0.904785
-0.292217315	0.3091386552	14825/16384	0.904846
-0.2905077897	0.308553041	7413/8192	0.904907
-0.2891081153	0.3069519818	14827/16384	0.904968
-0.2943838225	0.2967699914	1839/2032	0.90502
-0.2939793548	0.2971532731	3707/4096	0.905029
-0.2930690283	0.297217221	14829/16384	0.90509
-0.2976359344	0.2939245516	7415/8192	0.905151
-0.2943515193	0.2869723569	14831/16384	0.905212
-0.293265868	0.2891562312	1825/2016	0.905258
-0.293191243	0.2890798618	927/1024	0.905273
-0.293191243	0.2890798618	927/1024	0.905273
-0.2931774204	0.2890423657	14833/16384	0.905334
-0.2933928984	0.289109891	1847/2040	0.905392
-0.2933843873	0.2891265344	7417/8192	0.905396
-0.2934553168	0.2894440814	14835/16384	0.905457
-0.2919383069	0.2898752114	3709/4096	0.905518
-0.2924284913	0.2901269029	1851/2044	0.905577
-0.2924283484	0.2901497211	14837/16384	0.905579
-0.2923989279	0.2901021958	1391/1536	0.905599
-0.2919273418	0.2917293888	7419/8192	0.90564
-0.2920297187	0.2918120145	1853/2046	0.90567
-0.2912281169	0.2915684953	14839/16384	0.905701
-0.290232593	0.2921159751	1739/1920	0.905729
-0.2908967425	0.292661934	1797/1984	0.905746
-0.290834811	0.2925728161	1855/2048	0.905762
-0.2908303476	0.2925341975	14841/16384	0.905823
-0.2911391962	0.2927590204	7421/8192	0.905884
-0.2914053253	0.2925814801	14843/16384	0.905945
-0.2916790163	0.2926728566	1841/2032	0.906004
-0.2916783508	0.2926722185	3711/4096	0.906006
-0.2916652512	0.2925981919	14845/16384	0.906067
-0.2915925519	0.2925193519	7423/8192	0.906128
-0.2915773934	0.2925510534	14847/16384	0.906189
-0.2915833771	0.292549126	29/32	0.90625
-0.2915833771	0.292549126	29/32	0.90625
-0.2915856496	0.2925489846	1853/2044	0.906556
-0.2915878969	0.2925532607	1855/2046	0.906647
-0.2915824065	0.292551576	14855/16384	0.906677
-0.2915756412	0.2925580828	1799/1984	0.906754
-0.2915755607	0.2925581365	1741/1920	0.906771
-0.2915755951	0.292557678	1625/1792	0.906808
-0.291577398	0.2925584794	1393/1536	0.906901
-0.2915788988	0.2925619085	14859/16384	0.906921
-0.2915573783	0.2925520433	3715/4096	0.906982
-0.2915573904	0.2925520552	1843/2032	0.906988
-0.2915761996	0.2925382157	7431/8192	0.907104
-0.2915690834	0.2924923044	1829/2016	0.907242
-0.2915708395	0.2924932937	617/680	0.907353
-0.2915704461	0.2924963633	14867/16384	0.90741
-0.2915611346	0.2924978849	3717/4096	0.907471
-0.2915624628	0.2924985546	265/292	0.907534
-0.2915443435	0.292494703	7435/8192	0.907593
-0.2915426197	0.2924993688	619/682	0.907625
-0.2915664111	0.2924787894	14871/16384	0.907654
-0.29164494	0.2924350691	1859/2048	0.907715
-0.2916459397	0.2924368499	1801/1984	0.907762
-0.2916414278	0.2924378704	14873/16384	0.907776
-0.2916355285	0.2924354064	581/640	0.907813
-0.2916867385	0.2923788449	14875/16384	0.907898
-0.2916482164	0.2925509441	3719/4096	0.907959
-0.2916480266	0.2925510292	1845/2032	0.907972
-0.291665739	0.2926041675	14877/16384	0.90802
-0.2918373426	0.2928188011	7439/8192	0.908081
-0.2918740122	0.2926299812	14879/16384	0.908142
-0.2918581581	0.2926533577	465/512	0.908203
-0.2918581581	0.2926533577	465/512	0.908203
-0.2918580946	0.2926534166	1831/2016	0.908234
-0.2918600704	0.2926543526	109/120	0.908333
-0.2918597241	0.2926578375	14883/16384	0.908386
-0.2918488726	0.2926578908	3721/4096	0.908447
-0.2918500798	0.2926590752	14885/16384	0.908508
-0.2918500878	0.2926590832	1857/2044	0.908513
-0.2918372205	0.2926473796	7443/8192	0.908569
-0.2918335016	0.2926488286	169/186	0.908602
-0.2918555405	0.292642303	14887/16384	0.90863
-0.2918576844	0.2926041585	1861/2048	0.908691
-0.2918590142	0.2926050782	14889/16384	0.908752
-0.29185909	0.2926048271	1803/1984	0.90877
-0.2918510537	0.2926077738	7445/8192	0.908813
-0.2918520141	0.2926082696	349/384	0.908854
-0.2918391688	0.2926038377	14891/16384	0.908875
-0.2919190042	0.2925429953	3723/4096	0.908936
-0.2919200176	0.2925424765	1847/2032	0.908957
-0.2919043019	0.2925224811	14893/16384	0.908997
-0.291922434	0.292681095	7447/8192	0.909058
-0.2916418243	0.2929978335	14895/16384	0.909119
-0.2918692239	0.2931397339	931/1024	0.90918
-0.2918692239	0.2931397339	931/1024	0.90918
-0.2918703025	0.2931416347	611/672	0.909226
-0.2918653104	0.2931426554	14897/16384	0.909241
-0.2918683841	0.2931164343	7449/8192	0.909302
-0.2918686413	0.2931161953	371/408	0.909314
-0.2919002873	0.2930997599	14899/16384	0.909363
-0.2919876014	0.2931979613	3725/4096	0.909424
-0.2919868445	0.293174093	14901/16384	0.909485
-0.2919870582	0.2931737558	1859/2044	0.909491
-0.2919842039	0.2931761245	1397/1536	0.909505
-0.2919713552	0.2934908017	7451/8192	0.909546
-0.292051595	0.2935459763	1861/2046	0.90958
-0.2917472805	0.2932186922	14903/16384	0.909607
-0.2913878672	0.292805346	1863/2048	0.909668
-0.2913979978	0.292825461	14905/16384	0.909729
-0.2913583523	0.2928080162	1805/1984	0.909778
-0.2911446202	0.2926948714	7453/8192	0.90979
-0.2908074811	0.292995665	14907/16384	0.909851
-0.290232593	0.2921159751	1747/1920	0.909896
-0.2899123162	0.292741881	1849/2032	0.909941
-0.2898219597	0.2932165304	14909/16384	0.909973
-0.2904066913	0.2934195479	7455/8192	0.910034
-0.2903918963	0.293273285	14911/16384	0.910095
-0.2903734801	0.2932913686	233/256	0.910156
-0.2903734801	0.2932913686	233/256	0.910156
-0.2903734769	0.2932909565	1835/2016	0.910218
-0.2903750938	0.2932925268	619/680	0.910294
-0.2903745234	0.2932957448	14915/16384	0.910339
-0.2903640264	0.293294988	3729/4096	0.9104
-0.2903651155	0.2932962747	14917/16384	0.910461
-0.2903650927	0.2932962595	1861/2044	0.91047
-0.29035272	0.2932829368	7459/8192	0.910522
-0.2903485097	0.2932839628	621/682	0.910557
-0.2903725154	0.2932802132	14919/16384	0.910583
-0.2903860997	0.2932443626	1865/2048	0.910645
-0.2903781658	0.2932449426	7461/8192	0.910767
-0.2903782646	0.2932447081	1807/1984	0.910786
-0.2903788851	0.2932458283	1399/1536	0.910807
-0.2903677004	0.2932355051	14923/16384	0.910828
-0.2904592657	0.293234815	3731/4096	0.910889
-0.2904561764	0.2932352927	1851/2032	0.910925
-0.2904530105	0.2932315853	583/640	0.910937
-0.2904654269	0.2932171567	14925/16384	0.91095
-0.2904216377	0.2933167062	7463/8192	0.911011
-0.2905173579	0.2935688852	14927/16384	0.911072
-0.2905518397	0.2934425103	933/1024	0.911133
-0.2905518397	0.2934425103	933/1024	0.911133
-0.2905530752	0.2934435478	14929/16384	0.911194
-0.2905531644	0.2934432915	1837/2016	0.91121
-0.2905442621	0.2934443518	7465/8192	0.911255
-0.290544406	0.2934441326	1633/1792	0.911272
-0.2905443624	0.2934441132	1859/2040	0.911275
-0.2905374039	0.2934346675	14931/16384	0.911316
-0.2905596503	0.2934071048	3733/4096	0.911377
-0.2905543173	0.2934084605	14933/16384	0.911438
-0.2905543599	0.2934082967	1863/2044	0.911448
-0.2906111879	0.2933762352	7467/8192	0.911499
-0.290605827	0.2933605494	1865/2046	0.911535
-0.290595519	0.293471318	14935/16384	0.91156
-0.2905768469	0.2938599165	1867/2048	0.911621
-0.2905701403	0.2938377902	14937/16384	0.911682
-0.290700064	0.2938745513	7469/8192	0.911743
-0.2906940757	0.2938218657	1809/1984	0.911794
-0.2908369304	0.2941110449	14939/16384	0.911804
-0.290071714	0.2934326161	3735/4096	0.911865
-0.2900724553	0.2934684401	1853/2032	0.911909
-0.2899523386	0.2931174746	14941/16384	0.911926
-0.290232593	0.2921159751	1751/1920	0.911979
-0.2897235582	0.2915734468	7471/8192	0.911987
-0.2884385509	0.2919511312	14943/16384	0.912048
-0.2886996873	0.2920026823	467/512	0.912109
-0.2886996873	0.2920026823	467/512	0.912109
-0.2886911773	0.2920010585	613/672	0.912202
-0.2887007445	0.2919833484	7473/8192	0.912231
-0.2887007405	0.2919847623	1861/2040	0.912255
-0.2887302953	0.2919729235	14947/16384	0.912292
-0.2887743164	0.2920588322	3737/4096	0.912354
-0.2887712872	0.2920592056	1635/1792	0.912388
-0.2887786319	0.2920444825	14949/16384	0.912415
-0.2887785405	0.2920454821	1865/2044	0.912427
-0.2887463816	0.2922014504	7475/8192	0.912476
-0.2887743501	0.2922224239	1867/2046	0.912512
-0.2886133222	0.2920700839	14951/16384	0.912537
-0.2882250108	0.2922203338	1869/2048	0.912598
-0.2882302846	0.2922012931	14953/16384	0.912659
-0.2882968885	0.2922790391	7477/8192	0.91272
-0.2883199833	0.2924355979	14955/16384	0.912781
-0.2883607853	0.2924167518	1811/1984	0.912802
-0.287401858	0.2914883187	3739/4096	0.912842
-0.2874245962	0.2916740312	1855/2032	0.912894
-0.2870798253	0.2915915946	14957/16384	0.912903
-0.2887567195	0.2914195102	7479/8192	0.912964
-0.290232593	0.2921159751	1753/1920	0.913021
-0.2907090096	0.2918965864	14959/16384	0.913025
-0.2910839895	0.2911040666	935/1024	0.913086
-0.2910839895	0.2911040666	935/1024	0.913086
-0.2910929493	0.2911231773	14961/16384	0.913147
-0.2910611688	0.2911083308	263/288	0.913194
-0.290981923	0.2910928653	7481/8192	0.913208
-0.2909840072	0.2910961156	621/680	0.913235
-0.2909119567	0.290938701	14963/16384	0.913269
-0.2919232696	0.2905607188	3741/4096	0.91333
-0.2914942367	0.2903347062	14965/16384	0.913391
-0.2915024456	0.2903493126	1867/2044	0.913405
-0.2915240694	0.2903712896	1403/1536	0.913411
-0.2913846283	0.2882741558	7483/8192	0.913452
-0.2911558602	0.2882767519	623/682	0.91349
-0.2928918043	0.2881179223	14967/16384	0.913513
-0.2933920233	0.2838904596	1871/2048	0.913574
-0.2934788672	0.2841019227	14969/16384	0.913635
-0.2909753594	0.2856569617	14971/16384	0.913757
-0.2901895436	0.2863048765	1813/1984	0.91381
-0.2901418936	0.2862459088	3743/4096	0.913818
-0.2903135703	0.2863559721	1857/2032	0.913878
-0.2902952696	0.2863638345	14973/16384	0.913879
-0.2907146796	0.2862755739	7487/8192	0.91394
-0.2906619873	0.2861754606	14975/16384	0.914001
-0.2906555844	0.2861943201	117/128	0.914062
-0.2906555844	0.2861943201	117/128	0.914062
-0.2906570149	0.2861945466	1843/2016	0.914187
-0.2906569556	0.2861943394	373/408	0.914216
-0.2906575475	0.2861968898	14979/16384	0.914246
-0.2906514939	0.2861998408	267/292	0.914384
-0.2906390719	0.2861950987	7491/8192	0.914429
-0.2906372066	0.2861974172	1871/2046	0.914467
-0.2906520059	0.2861871752	14983/16384	0.91449
-0.2906486537	0.2861572244	1873/2048	0.914551
-0.2906497156	0.2861578797	14985/16384	0.914612
-0.2906486462	0.2861569578	1639/1792	0.914621
-0.2906434835	0.2861604446	7493/8192	0.914673
-0.290644265	0.2861607709	1405/1536	0.914714
-0.2907014952	0.2861224972	3747/4096	0.914795
-0.2907020288	0.286123667	1815/1984	0.914819
-0.29069977	0.2861059032	14989/16384	0.914856
-0.2906999403	0.2861056323	1859/2032	0.914862
-0.2906958893	0.2862003463	7495/8192	0.914917
-0.2908086447	0.2863803888	14991/16384	0.914978
-0.2908268944	0.2862762312	937/1024	0.915039
-0.2908268944	0.2862762312	937/1024	0.915039
-0.2906486462	0.2861569578	1757/1920	0.915104
-0.290821106	0.2862783451	7497/8192	0.915161
-0.2908211942	0.2862781808	205/224	0.915179
-0.2908217131	0.2862791059	1867/2040	0.915196
-0.2908146023	0.2862713036	14995/16384	0.915222
-0.2908297857	0.2862459839	3749/4096	0.915283
-0.2908255826	0.2862477556	14997/16384	0.915344
-0.2908260807	0.2862481931	1871/2044	0.915362
-0.2908727694	0.28621161	7499/8192	0.915405
-0.2908637727	0.2861999021	1873/2046	0.915445
-0.2908619829	0.2862988709	14999/16384	0.915466
-0.2908079744	0.2865747102	1875/2048	0.915527
-0.2908085105	0.2865616844	15001/16384	0.915588
-0.2908722747	0.2866133234	7501/8192	0.915649
-0.2908506204	0.2867759674	15003/16384	0.91571
-0.2905187285	0.2863467562	3751/4096	0.915771
-0.2905006411	0.286344972	1817/1984	0.915827
-0.2904198699	0.2862691013	15005/16384	0.915833
-0.290409226	0.2862701754	1861/2032	0.915846
-0.289477575	0.2865287179	7503/8192	0.915894
-0.2899673064	0.2868120413	15007/16384	0.915955
-0.2899272117	0.2867467559	469/512	0.916016
-0.2899272117	0.2867467559	469/512	0.916016
-0.2899226633	0.2867500423	7505/8192	0.916138
-0.2899226302	0.2867500601	1759/1920	0.916146
-0.2899234315	0.2867505395	1847/2016	0.916171
-0.289923438	0.2867504011	623/680	0.916176
-0.2899146581	0.2867451587	15011/16384	0.916199
-0.28992727	0.286718723	3753/4096	0.91626
-0.2899230553	0.2867202249	15013/16384	0.916321
-0.28992358	0.2867205834	1873/2044	0.916341
-0.2899678376	0.2867022204	7507/8192	0.916382
-0.2899672515	0.2866922084	625/682	0.916422
-0.2899565219	0.2867552341	15015/16384	0.916443
-0.2900486206	0.2868069973	1877/2048	0.916504
-0.2900449023	0.2868088955	15017/16384	0.916565
-0.2900730967	0.2867630872	15019/16384	0.916687
-0.2901153791	0.2870295576	3755/4096	0.916748
-0.2901794586	0.287023031	15021/16384	0.916809
-0.2901701466	0.2870171443	1863/2032	0.916831
-0.2901708866	0.286997229	1819/1984	0.916835
-0.2897798892	0.2868648117	7511/8192	0.91687
-0.2890141053	0.285596796	15023/16384	0.916931
-0.2884186916	0.2864629952	939/1024	0.916992
-0.2884186916	0.2864629952	939/1024	0.916992
-0.2884095299	0.2864506257	15025/16384	0.917053
-0.2884943346	0.2864602364	7513/8192	0.917114
-0.2884858742	0.2864507702	1871/2040	0.917157
-0.2884986449	0.2864311359	1849/2016	0.917163
-0.2885486015	0.2865640973	15027/16384	0.917175
-0.2885498106	0.2865531985	587/640	0.917188
-0.2882595795	0.2868494422	3757/4096	0.917236
-0.2883281223	0.2868412481	15029/16384	0.917297
-0.2883219283	0.2868342102	1409/1536	0.917318
-0.2883193802	0.2868354838	1875/2044	0.917319
-0.2873753397	0.2870536139	7515/8192	0.917358
-0.2873703314	0.2872907318	1877/2046	0.9174
-0.2881443714	0.2860200487	15031/16384	0.917419
-0.2903788993	0.2849845947	1879/2048	0.91748
-0.2902792247	0.284956836	15033/16384	0.917542
-0.2912170407	0.2848462331	7517/8192	0.917603
-0.2925401095	0.2809608002	15035/16384	0.917664
-0.3009273392	0.2841310779	3759/4096	0.917725
-0.3028541199	0.2821277177	15037/16384	0.917786
-0.2980392889	0.2773846103	1865/2032	0.917815
-0.2956738744	0.2755861447	1821/1984	0.917843
-0.296257318	0.2771947107	15039/16384	0.917908
-0.2964345271	0.2769615686	235/256	0.917969
-0.2964345271	0.2769615686	235/256	0.917969
-0.2964175622	0.2769528696	7521/8192	0.918091
-0.2964131869	0.2769594106	1873/2040	0.918137
-0.2964202957	0.276920149	15043/16384	0.918152
-0.2964202407	0.2769200461	617/672	0.918155
-0.2965262354	0.2769164092	3761/4096	0.918213
-0.296526785	0.2769161496	1763/1920	0.918229
-0.2965139277	0.276906071	15045/16384	0.918274
-0.2965100706	0.2769105726	1877/2044	0.918297
-0.2966572684	0.2770353357	7523/8192	0.918335
-0.2966920603	0.2770003881	1879/2046	0.918377
-0.2964437921	0.2770626032	15047/16384	0.918396
-0.296332756	0.2774795493	1881/2048	0.918457
-0.2963227594	0.277467262	15049/16384	0.918518
-0.2964120003	0.2774634387	7525/8192	0.918579
-0.2964038243	0.277456182	1411/1536	0.91862
-0.2965341444	0.2775510002	15051/16384	0.91864
-0.2955066193	0.2776585446	3763/4096	0.918701
-0.2954632968	0.2778594256	15053/16384	0.918762
-0.2950790159	0.2779881304	1867/2032	0.918799
-0.2959646948	0.276695338	7527/8192	0.918823
-0.2959648963	0.2766557055	1823/1984	0.918851
-0.2941023549	0.2751898134	941/1024	0.918945
-0.2941023549	0.2751898134	941/1024	0.918945
-0.2940877557	0.2751810757	15057/16384	0.919006
-0.2941858621	0.2751564961	7529/8192	0.919067
-0.2941849511	0.2751589446	1647/1792	0.919085
-0.2941705772	0.2751189695	125/136	0.919118
-0.2942864293	0.2752631446	15059/16384	0.919128
-0.2943180137	0.2752546104	1853/2016	0.919147
-0.2940585965	0.2756404418	3765/4096	0.919189
-0.2941097033	0.2756102758	353/384	0.919271
-0.2941042883	0.275593142	1879/2044	0.919276
-0.2934419208	0.2761429586	7531/8192	0.919312
-0.2936124193	0.2762647699	57/62	0.919355
-0.2936209732	0.2748589509	15063/16384	0.919373
-0.2940385314	0.2687533074	1883/2048	0.919434
-0.2940976966	0.2690522095	15065/16384	0.919495
-0.2922616575	0.268252078	7533/8192	0.919556
-0.2910226003	0.2640220476	15067/16384	0.919617
-0.2996127859	0.2759089465	3767/4096	0.919678
-0.3000171212	0.2776264052	15069/16384	0.919739
-0.3029619811	0.2864011071	1869/2032	0.919783
-0.2969416736	0.2897072966	7535/8192	0.9198
-0.3004717235	0.2964706733	1825/1984	0.919859
-0.300106479	0.296517899	15071/16384	0.919861
-0.3009172259	0.2942985444	471/512	0.919922
-0.3009172259	0.2942985444	471/512	0.919922
-0.3007643238	0.2943115551	7537/8192	0.920044
-0.3007306362	0.2943149977	1877/2040	0.920098
-0.3006616234	0.29409147	15075/16384	0.920105
-0.3009357638	0.294141134	265/288	0.920139
-0.3012727013	0.2936541042	3769/4096	0.920166
-0.3012827999	0.2936770573	1649/1792	0.920201
-0.3011527814	0.2936475387	15077/16384	0.920227
-0.3011282775	0.2936527691	1881/2044	0.920254
-0.3024974273	0.2936687924	7539/8192	0.920288
-0.302387043	0.2936078152	589/640	0.920312
-0.3026172575	0.2932519552	1883/2046	0.920332
-0.3015233966	0.2948833878	15079/16384	0.920349
-0.3027407418	0.2998061609	1885/2048	0.92041
-0.3023959258	0.2996842542	15081/16384	0.920471
-0.3037441428	0.2986302503	7541/8192	0.920532
-0.3060811846	0.2979733061	15083/16384	0.920593
-0.3028717662	0.3231148113	3771/4096	0.920654
-0.2944603915	0.3227545687	1871/2032	0.920768
-0.2886436204	0.3221166241	7543/8192	0.920776
-0.2664665022	0.3258254341	15087/16384	0.920837
-0.2705212174	0.3370682535	1827/1984	0.920867
-0.270918035	0.3343263523	943/1024	0.920898
-0.270918035	0.3343263523	943/1024	0.920898
-0.2705963886	0.3343389694	15089/16384	0.920959
-0.2725377105	0.3338335038	1879/2040	0.921078
-0.2730357548	0.3333181302	15091/16384	0.921082
-0.2732273105	0.3400414822	619/672	0.921131
-0.274411698	0.3382865573	3773/4096	0.921143
-0.2748480354	0.3373417079	15093/16384	0.921204
-0.2746767779	0.3373576816	1415/1536	0.921224
-0.2760288695	0.3374417562	269/292	0.921233
-0.2747572572	0.3472434342	7547/8192	0.921265
-0.2791225318	0.3499163014	1885/2046	0.92131
-0.2744612123	0.3637327563	15095/16384	0.921326
-0.2871721039	0.3745037793	1769/1920	0.921354
-0.2884177135	0.3666450734	1887/2048	0.921387
-0.2878517136	0.3671023568	15097/16384	0.921448
-0.2881285862	0.3639525132	7549/8192	0.921509
-0.2921327601	0.3613942193	15099/16384	0.92157
-0.2906818265	0.353178006	3775/4096	0.921631
-0.2903167952	0.3535766773	15101/16384	0.921692
-0.2879901105	0.3546441079	1873/2032	0.921752
-0.2879964075	0.3546424945	7551/8192	0.921753
-0.2887586616	0.3550165055	15103/16384	0.921814
-0.2886839778	0.3548385121	59/64	0.921875
-0.2886839778	0.3548385121	59/64	0.921875
-0.28864244	0.354846203	627/680	0.922059
-0.2886637876	0.3547582508	1859/2016	0.922123
-0.2886481865	0.3547674315	15109/16384	0.92218
-0.2886230254	0.3547592194	1885/2044	0.922211
-0.2888054232	0.3546349795	629/682	0.922287
-0.288771604	0.3548038685	15111/16384	0.922302
-0.288974485	0.3549620701	1771/1920	0.922396
-0.288952394	0.3549656406	15113/16384	0.922424
-0.2889529417	0.3549647647	1653/1792	0.922433
-0.2889768102	0.3548919551	7557/8192	0.922485
-0.2889660008	0.3548978798	1417/1536	0.922526
-0.2890574276	0.3548341535	15115/16384	0.922546
-0.2889438622	0.3553739693	3779/4096	0.922607
-0.2890598928	0.3554390244	15117/16384	0.922668
-0.2885855209	0.3551802767	7559/8192	0.922729
-0.2885841214	0.3551790368	1875/2032	0.922736
-0.2874498591	0.3547772907	15119/16384	0.922791
-0.2876475198	0.355389077	945/1024	0.922852
-0.2876475198	0.355389077	945/1024	0.922852
-0.287651919	0.3553920773	1831/1984	0.922883
-0.2876736808	0.3553226286	7561/8192	0.922974
-0.2877597395	0.3553270553	15123/16384	0.923035
-0.2877606705	0.3553282213	1883/2040	0.923039
-0.2878272068	0.3555787682	3781/4096	0.923096
-0.2878306092	0.3555808897	1861/2016	0.923115
-0.2878462472	0.3555300376	15125/16384	0.923157
-0.2879142044	0.3555070389	1887/2044	0.92319
-0.2877947711	0.3559649437	7563/8192	0.923218
-0.2880267008	0.3562365315	1889/2046	0.923265
-0.2873637072	0.3556739601	15127/16384	0.923279
-0.2865616673	0.3542924163	1891/2048	0.92334
-0.2866411899	0.3543675804	15129/16384	0.923401
-0.2866066483	0.3544835632	591/640	0.923438
-0.2860999531	0.3544309883	7565/8192	0.923462
-0.2855821784	0.3537389622	15131/16384	0.923523
-0.2879390655	0.3537757946	3783/4096	0.923584
-0.2880277	0.3534302683	15133/16384	0.923645
-0.2913083273	0.3513150184	7567/8192	0.923706
-0.2912562681	0.3514196418	1877/2032	0.92372
-0.2888271959	0.3504848851	15135/16384	0.923767
-0.2892558976	0.3508331224	473/512	0.923828
-0.2892558976	0.3508331224	473/512	0.923828
-0.2892413864	0.3508388487	1833/1984	0.923891
-0.2892726618	0.3507753295	7569/8192	0.92395
-0.2893545314	0.3507723191	15139/16384	0.924011
-0.2893486763	0.3507726934	377/408	0.92402
-0.2893812179	0.3510140405	3785/4096	0.924072
-0.2893698284	0.3510106345	207/224	0.924107
-0.2894112625	0.350978785	15141/16384	0.924133
-0.2894754026	0.3509796236	1889/2044	0.924168
-0.2892174722	0.3512325376	7571/8192	0.924194
-0.2891670146	0.3514028163	61/66	0.924242
-0.2890778553	0.3510056357	15143/16384	0.924255
-0.2884495752	0.350948197	1893/2048	0.924316
-0.2884728083	0.3509099077	15145/16384	0.924377
-0.2885354488	0.3510837639	7573/8192	0.924438
-0.288547261	0.3510580495	355/384	0.924479
-0.288470622	0.3512954835	15147/16384	0.9245
-0.2875634127	0.3501506272	3787/4096	0.924561
-0.2872401429	0.3504034546	15149/16384	0.924622
-0.2890649101	0.3496357296	7575/8192	0.924683
-0.288945088	0.3496421119	1879/2032	0.924705
-0.2941035861	0.3494995454	947/1024	0.924805
-0.2941035861	0.3494995454	947/1024	0.924805
-0.2941867086	0.3495432548	15153/16384	0.924866
-0.2941590376	0.3496676335	1835/1984	0.924899
-0.2937897814	0.3496395664	7577/8192	0.924927
-0.2934800833	0.3493340912	15155/16384	0.924988
-0.2934968448	0.3493842237	37/40	0.925
-0.2942551674	0.3479978865	3789/4096	0.925049
-0.2942861313	0.3481898742	1865/2016	0.925099
-0.2939362965	0.3481163956	15157/16384	0.92511
-0.2939848355	0.3481490363	1421/1536	0.92513
-0.2935616478	0.3479544085	1891/2044	0.925147
-0.2968661435	0.3471959824	7579/8192	0.925171
-0.2984286168	0.3455321133	631/682	0.92522
-0.2958802628	0.3499305921	15159/16384	0.925232
-0.29345914	0.3546168337	1895/2048	0.925293
-0.2935095214	0.3543391476	15161/16384	0.925354
-0.2944225769	0.3555176233	7581/8192	0.925415
-0.2927167467	0.3582512112	15163/16384	0.925476
-0.2871721039	0.3745037793	1777/1920	0.925521
-0.2933631011	0.375054879	3791/4096	0.925537
-0.2956359862	0.3740590361	15165/16384	0.925598
-0.3062570392	0.3643846183	7583/8192	0.925659
-0.3058123523	0.3649952534	1881/2032	0.925689
-0.3025009384	0.3661244554	15167/16384	0.92572
-0.3033321519	0.3664870879	237/256	0.925781
-0.3033321519	0.3664870879	237/256	0.925781
-0.3033058115	0.3663827035	1837/1984	0.925907
-0.3034279855	0.3663115632	15171/16384	0.925964
-0.3034216422	0.3662669084	1889/2040	0.92598
-0.3036908797	0.3666748694	3793/4096	0.926025
-0.3037023325	0.3665808525	15173/16384	0.926086
-0.3037017781	0.3665794182	1867/2016	0.926091
-0.3037953994	0.366463606	1893/2044	0.926125
-0.3035689191	0.367210196	7587/8192	0.926147
-0.3036925804	0.3677313987	1895/2046	0.926197
-0.3031893693	0.3668849563	15175/16384	0.926208
-0.30197484	0.3668825342	1897/2048	0.92627
-0.3020175098	0.3668040462	15177/16384	0.926331
-0.3021462228	0.3671553566	7589/8192	0.926392
-0.3021674149	0.3670972467	1423/1536	0.926432
-0.3019764662	0.3676064887	15179/16384	0.926453
-0.3011611031	0.3654412352	3795/4096	0.926514
-0.3011762957	0.365639294	593/640	0.926562
-0.3006789945	0.3654891803	15181/16384	0.926575
-0.3026213478	0.3652459272	7591/8192	0.926636
-0.3027342088	0.3649327629	1883/2032	0.926673
-0.3069436986	0.3619649754	15183/16384	0.926697
-0.3041625724	0.3618404797	949/1024	0.926758
-0.3041625724	0.3618404797	949/1024	0.926758
-0.3041559215	0.3617679957	15185/16384	0.926819
-0.3043682826	0.36200668	7593/8192	0.92688
-0.3043527008	0.3620083089	1661/1792	0.926897
-0.3043921991	0.3619532806	1839/1984	0.926915
-0.3042293024	0.3623038164	15187/16384	0.926941
-0.3043026648	0.3623582942	1891/2040	0.926961
-0.303297893	0.3621409723	3797/4096	0.927002
-0.3034287436	0.3622719146	15189/16384	0.927063
-0.3034339794	0.3622382845	89/96	0.927083
-0.3034680329	0.3625323564	1895/2044	0.927104
-0.3022980141	0.361438892	7595/8192	0.927124
-0.3012703578	0.3617708565	1897/2046	0.927175
-0.3036178231	0.3607361418	15191/16384	0.927185
-0.3095108688	0.3581379042	1899/2048	0.927246
-0.3092614512	0.358616832	15193/16384	0.927307
-0.3082885259	0.3563341151	7597/8192	0.927368
-0.3097049521	0.3528491015	15195/16384	0.927429
-0.3102944703	0.3668220963	3799/4096	0.92749
-0.3119381372	0.3688073958	15197/16384	0.927551
-0.2871721039	0.3745037793	1781/1920	0.927604
-0.2862841541	0.3793045194	7599/8192	0.927612
-0.2839763529	0.3816769663	1885/2032	0.927657
-0.2883154841	0.4023749721	15199/16384	0.927673
-0.2906139166	0.3944959776	475/512	0.927734
-0.2906139166	0.3944959776	475/512	0.927734
-0.2908803251	0.3946093156	15201/16384	0.927795
-0.289724427	0.3948586626	7601/8192	0.927856
-0.2890725672	0.3939117746	15203/16384	0.927917
-0.2891160298	0.3938742675	1841/1984	0.927923
-0.2884545614	0.3933648641	631/680	0.927941
-0.2915443614	0.3918381625	3801/4096	0.927979
-0.2916254392	0.3920174816	1663/1792	0.928013
-0.2908769604	0.3917999635	15205/16384	0.92804
-0.2905123652	0.3910766878	1871/2016	0.928075
-0.2897093334	0.3908393393	271/292	0.928082
-0.2946267032	0.3918190435	7603/8192	0.928101
-0.2976533123	0.3900009387	633/682	0.928152
-0.293736223	0.3944245628	15207/16384	0.928162
-0.2975950433	0.4036126159	1901/2048	0.928223
-0.2964547757	0.4036964065	15209/16384	0.928284
-0.2989436836	0.4005360784	7605/8192	0.928345
-0.3029115041	0.3991704197	15211/16384	0.928406
-0.2864571456	0.4178531029	3803/4096	0.928467
-0.2899820666	0.4244750464	15213/16384	0.928528
-0.2803817501	0.4033340025	7607/8192	0.928589
-0.2839763529	0.3816769663	1887/2032	0.928642
-0.2871721039	0.3745037793	1783/1920	0.928646
-0.2837777257	0.3733993964	15215/16384	0.92865
-0.2733814679	0.3722976163	951/1024	0.928711
-0.2733814679	0.3722976163	951/1024	0.928711
-0.2736087441	0.3717853325	15217/16384	0.928772
-0.274370358	0.3738218637	7609/8192	0.928833
-0.2732184242	0.3756509568	15219/16384	0.928894
-0.2723334505	0.3763496248	379/408	0.928922
-0.2717299469	0.3741788282	1843/1984	0.928931
-0.2658540135	0.3723685916	3805/4096	0.928955
-0.2664878738	0.3742800245	15221/16384	0.929016
-0.2667392005	0.3739782246	1427/1536	0.929036
-0.2639479983	0.3789011876	1899/2044	0.929061
-0.2603700145	0.3742076281	1873/2016	0.929067
-0.2592413433	0.3608164031	7611/8192	0.929077
-0.2522237587	0.353617722	1901/2046	0.92913
-0.262971684	0.3383832369	15223/16384	0.929138
-0.2496018427	0.3214738552	1903/2048	0.929199
-0.2508861577	0.3221740887	15225/16384	0.92926
-0.2460774266	0.3262741613	7613/8192	0.929321
-0.2400799045	0.3287918034	15227/16384	0.929382
-0.2256468919	0.3353122564	3807/4096	0.929443
-0.227685576	0.3349259253	15229/16384	0.929504
-0.2328732403	0.3391516787	7615/8192	0.929565
-0.2331068279	0.3370457194	15231/16384	0.929626
-0.2331121426	0.3370434427	1889/2032	0.929626
-0.2326446198	0.3372607068	119/128	0.929688
-0.2326446198	0.3372607068	119/128	0.929688
-0.2326523437	0.3374032035	15235/16384	0.929871
-0.2325648155	0.3373476183	1897/2040	0.929902
-0.2323911453	0.3373365343	3809/4096	0.929932
-0.2323906824	0.3373375318	1845/1984	0.92994
-0.2324063949	0.3373859057	15237/16384	0.929993
-0.2322784828	0.3373840295	1901/2044	0.930039
-0.2321432995	0.3371106679	7619/8192	0.930054
-0.2321415798	0.3371072918	625/672	0.93006
-0.2321307219	0.3369225859	173/186	0.930108
-0.2324451088	0.3368801827	15239/16384	0.930115
-0.2326983011	0.3363061625	1905/2048	0.930176
-0.2327027319	0.3363552966	15241/16384	0.930237
-0.2327022065	0.3363530108	1667/1792	0.930246
-0.2325145569	0.3362953469	7621/8192	0.930298
-0.232523516	0.3363261002	1429/1536	0.930339
-0.2323133865	0.3361251944	15243/16384	0.930359
-0.2337554232	0.335763004	3811/4096	0.93042
-0.2338199946	0.3354057172	15245/16384	0.930481
-0.2341479308	0.3370311416	7623/8192	0.930542
-0.2349767189	0.3395192486	15247/16384	0.930603
-0.2349036767	0.339463882	1891/2032	0.93061
-0.2357958082	0.3384767194	953/1024	0.930664
-0.2357958082	0.3384767194	953/1024	0.930664
-0.2358061228	0.3385253944	15249/16384	0.930725
-0.2358055562	0.3385259237	1787/1920	0.930729
-0.235625256	0.338448886	7625/8192	0.930786
-0.2355512779	0.3382625108	15251/16384	0.930847
-0.2357543347	0.3382047816	633/680	0.930882
-0.2360029701	0.3378781133	3813/4096	0.930908
-0.2360096725	0.337910347	1847/1984	0.930948
-0.235889002	0.337861379	15253/16384	0.930969
-0.235978089	0.3376203372	1903/2044	0.931018
-0.2367516787	0.3373945109	7627/8192	0.93103
-0.2366857134	0.3374518343	1877/2016	0.931052
-0.2374006405	0.3372528856	635/682	0.931085
-0.2371741999	0.338792375	15255/16384	0.931091
-0.2366429036	0.3424059407	1907/2048	0.931152
-0.2366765644	0.3421132741	15257/16384	0.931213
-0.2377932633	0.3428572983	7629/8192	0.931274
-0.2382039134	0.3449131618	15259/16384	0.931335
-0.2321599452	0.3428245547	3815/4096	0.931396
-0.231652095	0.3438445536	15261/16384	0.931458
-0.2226087288	0.3434967506	7631/8192	0.931519
-0.2250872697	0.3494292342	15263/16384	0.93158
-0.224911386	0.348892561	1893/2032	0.931594
-0.2255282487	0.3476931718	477/512	0.931641
-0.2255282487	0.3476931718	477/512	0.931641
-0.2252935508	0.3476671883	7633/8192	0.931763
-0.2252923842	0.3476627754	1789/1920	0.931771
-0.2251838834	0.3474082045	15267/16384	0.931824
-0.2254915626	0.3472685614	1901/2040	0.931863
-0.2258376295	0.347019276	3817/4096	0.931885
-0.2257104458	0.3469505523	15269/16384	0.931946
-0.2257191191	0.3469511297	1849/1984	0.931956
-0.2259914144	0.3466420052	1905/2044	0.931996
-0.2266294268	0.3469115969	7635/8192	0.932007
-0.2267223153	0.3467223609	1879/2016	0.932044
-0.2270723532	0.3471927788	1907/2046	0.932063
-0.2267016561	0.3477576807	15271/16384	0.932068
-0.2277207193	0.3490075101	1909/2048	0.932129
-0.2275743138	0.348971387	15273/16384	0.93219
-0.227901629	0.3485505862	7637/8192	0.932251
-0.228415234	0.3482302767	15275/16384	0.932312
-0.229078241	0.3521598933	3819/4096	0.932373
-0.2303482068	0.3520563274	15277/16384	0.932434
-0.2238479858	0.3533697014	7639/8192	0.932495
-0.2158395451	0.3449567417	15279/16384	0.932556
-0.2142695114	0.3466170173	1895/2032	0.932579
-0.2117002658	0.3495231661	955/1024	0.932617
-0.2117002658	0.3495231661	955/1024	0.932617
-0.2117564941	0.3491698962	15281/16384	0.932678
-0.2127365934	0.3498992829	7641/8192	0.932739
-0.2131115368	0.3510420886	15283/16384	0.9328
-0.2132166184	0.3508792227	597/640	0.932813
-0.2113656358	0.3520513171	1903/2040	0.932843
-0.2097409739	0.3529896182	3821/4096	0.932861
-0.2105295741	0.3534672994	15285/16384	0.932922
-0.2105773259	0.3532975557	1433/1536	0.932943
-0.2114991253	0.3542062522	1851/1984	0.932964
-0.2072957843	0.3565108794	1907/2044	0.932975
-0.2045109508	0.3536969604	7643/8192	0.932983
-0.2017453632	0.3494633876	1909/2046	0.93304
-0.2040401385	0.347442734	15287/16384	0.933044
-0.204458967	0.3344315963	1911/2048	0.933105
-0.2045641856	0.3357106345	15289/16384	0.933167
-0.199990335	0.3351028251	7645/8192	0.933228
-0.195355841	0.3331520682	15291/16384	0.933289
-0.1840344932	0.3210618268	3823/4096	0.93335
-0.184593837	0.3235973489	15293/16384	0.933411
-0.1791362591	0.3294504956	7647/8192	0.933472
-0.1820248374	0.3310119418	15295/16384	0.933533
-0.1824603319	0.3301994541	1897/2032	0.933563
-0.1822108417	0.3301214422	239/256	0.933594
-0.1822108417	0.3301214422	239/256	0.933594
-0.1822066487	0.3301614138	15297/16384	0.933655
-0.1820750581	0.3301166232	7649/8192	0.933716
-0.1819707027	0.3300068964	15299/16384	0.933777
-0.1822672969	0.329779066	127/136	0.933824
-0.1821971178	0.3296667879	3825/4096	0.933838
-0.1821215316	0.3296429323	15301/16384	0.933899
-0.1824340881	0.3294690627	1909/2044	0.933953
-0.1825387518	0.3293012892	7651/8192	0.93396
-0.1825249272	0.3293172865	1853/1984	0.933972
-0.1828465842	0.3295550499	637/682	0.934018
-0.1830249341	0.3296292322	15303/16384	0.934021
-0.183015429	0.3296108084	269/288	0.934028
-0.1837008803	0.3299552358	1913/2048	0.934082
-0.1836366068	0.3299251827	15305/16384	0.934143
-0.1837535852	0.3297050236	7653/8192	0.934204
-0.1837099682	0.3296980541	1435/1536	0.934245
-0.1839473664	0.3294279575	15307/16384	0.934265
-0.1849606255	0.3309360357	3827/4096	0.934326
-0.185440837	0.3309063217	15309/16384	0.934387
-0.1841121002	0.3325486818	7655/8192	0.934448
-0.1823488741	0.3338376539	15311/16384	0.934509
-0.1831354016	0.3351246876	1899/2032	0.934547
-0.1834033369	0.3348333197	957/1024	0.93457
-0.1834033369	0.3348333197	957/1024	0.93457
-0.1833301241	0.3348086611	15313/16384	0.934631
-0.1834628022	0.3346032956	7657/8192	0.934692
-0.183454888	0.3346114307	1675/1792	0.93471
-0.1836611137	0.3344751311	15315/16384	0.934753
-0.1840458097	0.3349526287	1907/2040	0.934804
-0.184218765	0.3348572269	3829/4096	0.934814
-0.1842398489	0.3347144022	15317/16384	0.934875
-0.1842150339	0.3347123207	359/384	0.934896
-0.1847920134	0.3351912861	273/292	0.934932
-0.1851514554	0.3353107255	7659/8192	0.934937
-0.1853871511	0.3349539572	1855/1984	0.93498
-0.1848148415	0.3365596219	1913/2046	0.934995
-0.1845242144	0.337044452	15319/16384	0.934998
-0.1848185005	0.3381911509	1885/2016	0.93502
-0.1815850926	0.338919392	1915/2048	0.935059
-0.1819176935	0.3388395129	15321/16384	0.93512
-0.1820186275	0.3400498069	7661/8192	0.935181
-0.1814770863	0.3415170605	15323/16384	0.935242
-0.1767061243	0.3391570978	3831/4096	0.935303
-0.1760563134	0.3401742194	15325/16384	0.935364
-0.1701319613	0.3368121543	7663/8192	0.935425
-0.1649596949	0.3419960883	15327/16384	0.935486
-0.1691983005	0.3431601991	1901/2032	0.935531
-0.1688178312	0.3430626736	479/512	0.935547
-0.1688178312	0.3430626736	479/512	0.935547
-0.1686529081	0.3431054345	15329/16384	0.935608
-0.1686463058	0.3426288122	7665/8192	0.935669
-0.1688302049	0.3422389794	15331/16384	0.93573
-0.1699088685	0.3425686748	1909/2040	0.935784
-0.1698117138	0.3424145292	3833/4096	0.935791
-0.1697501963	0.3424030296	1677/1792	0.935826
-0.1697907091	0.3422151974	15333/16384	0.935852
-0.1706642462	0.342721229	1913/2044	0.93591
-0.1707706698	0.3425488368	7667/8192	0.935913
-0.1707543399	0.3423900251	599/640	0.935937
-0.1708223503	0.3434974482	1915/2046	0.935973
-0.1709862346	0.3435058603	15335/16384	0.935974
-0.171138418	0.34352207	1857/1984	0.935988
-0.1707288033	0.3445836835	629/672	0.936012
-0.1715242655	0.3448202215	1917/2048	0.936035
-0.1714496495	0.3446636306	15337/16384	0.936096
-0.1718919057	0.3444693011	7669/8192	0.936157
-0.1724041998	0.344266577	15339/16384	0.936218
-0.1729543801	0.3467787089	3835/4096	0.936279
-0.1736143376	0.3468210446	15341/16384	0.93634
-0.1722767249	0.3492926179	7671/8192	0.936401
-0.168970469	0.3516709171	15343/16384	0.936462
-0.1740610645	0.3549584277	1903/2032	0.936516
-0.1738482524	0.3555648403	959/1024	0.936523
-0.1738482524	0.3555648403	959/1024	0.936523
-0.1733607535	0.3556639842	15345/16384	0.936584
-0.1734364179	0.3544801448	7673/8192	0.936646
-0.1756067158	0.3527425353	637/680	0.936765
-0.175647585	0.3528600011	3837/4096	0.936768
-0.1752869957	0.3526711616	15349/16384	0.936829
-0.1752451749	0.3527391831	1439/1536	0.936849
-0.1764845753	0.3516171993	1915/2044	0.936888
-0.1764617682	0.351668102	7675/8192	0.93689
-0.1775929757	0.3515572956	639/682	0.93695
-0.1775675918	0.3515907224	15351/16384	0.936951
-0.1782022602	0.3517420468	1799/1920	0.936979
-0.1813607016	0.3524681892	1859/1984	0.936996
-0.180253763	0.3498876829	1889/2016	0.937004
-0.1797713803	0.3503500444	1919/2048	0.937012
-0.1791778569	0.3505320233	15353/16384	0.937073
-0.1783861473	0.3501845075	7677/8192	0.937134
-0.1780402601	0.3499987092	15355/16384	0.937195
-0.1775826486	0.3488722679	3839/4096	0.937256
-0.1776007363	0.3493548919	15357/16384	0.937317
-0.1771089837	0.3496191168	7679/8192	0.937378
-0.1773608552	0.3497834455	15359/16384	0.937439
-0.1773893736	0.3496877812	15/16	0.9375
-0.1773893736	0.3496877812	15/16	0.9375
-0.1773885497	0.3496914278	15361/16384	0.937561
-0.1773792927	0.3496859318	7681/8192	0.937622
-0.1773740401	0.3496773949	15363/16384	0.937683
-0.1773932424	0.3496599939	3841/4096	0.937744
-0.1773932495	0.3496600051	1913/2040	0.937745
-0.1773883073	0.3496570957	15365/16384	0.937805
-0.1774158739	0.3496446347	7683/8192	0.937866
-0.1775118805	0.3497544075	1917/2044	0.937867
-0.1774355003	0.3496645874	15367/16384	0.937927
-0.1774354964	0.3496645608	1919/2046	0.937928
-0.17746601	0.3496947156	1921/2048	0.937988
-0.1774662173	0.3496945336	1891/2016	0.937996
-0.1774665314	0.3496952781	1861/1984	0.938004
-0.1774645359	0.3496960995	1801/1920	0.938021
-0.1774620284	0.3496912239	15369/16384	0.938049
-0.1774621114	0.3496915374	1681/1792	0.938058
-0.177473208	0.3496807811	7685/8192	0.93811
-0.177470381	0.3496794409	1441/1536	0.938151
-0.177487497	0.3496693837	15371/16384	0.938171
-0.1775116658	0.3497545523	3843/4096	0.938232
-0.177536793	0.3497602548	15373/16384	0.938293
-0.1774595309	0.3498118469	7687/8192	0.938354
-0.1773509562	0.3497818163	15375/16384	0.938416
-0.1773795168	0.3499010923	961/1024	0.938477
-0.1773795168	0.3499010923	961/1024	0.938477
-0.177379731	0.3499009051	1907/2032	0.938484
-0.1773752796	0.3498971224	15377/16384	0.938538
-0.1773888389	0.3498894525	7689/8192	0.938599
-0.1774017459	0.3498878749	15379/16384	0.93866
-0.177419644	0.3499195002	3845/4096	0.938721
-0.1774197702	0.3499193767	383/408	0.938725
-0.1774244517	0.3499122091	15381/16384	0.938782
-0.1774537741	0.3499581071	7691/8192	0.938843
-0.1774541964	0.3499580952	1919/2044	0.938845
-0.1774005696	0.3500241188	15383/16384	0.938904
-0.177400284	0.3500247673	1921/2046	0.938905
-0.1772155068	0.3500361879	1923/2048	0.938965
-0.1772120431	0.350031798	631/672	0.938988
-0.1772259715	0.3500265808	1863/1984	0.939012
-0.1772365339	0.3500432193	15385/16384	0.939026
-0.1772494456	0.3500580308	601/640	0.939063
-0.1772012401	0.3501084664	7693/8192	0.939087
-0.1771161226	0.3501684415	15387/16384	0.939148
-0.1770502318	0.3498929917	3847/4096	0.939209
-0.1769995114	0.3498924838	15389/16384	0.93927
-0.1771448851	0.3495914717	7695/8192	0.939331
-0.1766679202	0.34949601	15391/16384	0.939392
-0.1768022565	0.3496710196	481/512	0.939453
-0.1768022565	0.3496710196	481/512	0.939453
-0.1768027447	0.3496716337	1909/2032	0.939469
-0.1767981459	0.3496667343	15393/16384	0.939514
-0.1768134911	0.349659654	7697/8192	0.939575
-0.1768285811	0.3496608421	15395/16384	0.939636
-0.1768338681	0.3496972408	3849/4096	0.939697
-0.176833933	0.3496975964	639/680	0.939706
-0.1768407473	0.3496936427	15397/16384	0.939758
-0.1768378554	0.3497328871	7699/8192	0.939819
-0.1768374884	0.3497331818	1921/2044	0.939824
-0.176803894	0.349747424	15399/16384	0.93988
-0.1768035295	0.3497472039	641/682	0.939883
-0.1767496061	0.3497812378	1925/2048	0.939941
-0.1767469942	0.3497785803	1895/2016	0.93998
-0.1767561871	0.3497758331	15401/16384	0.940002
-0.1767557541	0.3497744135	1865/1984	0.94002
-0.1767696081	0.3497950572	7701/8192	0.940063
-0.1767721029	0.3497911441	361/384	0.940104
-0.176784295	0.3498165406	15403/16384	0.940125
-0.1766400796	0.3498744154	3851/4096	0.940186
-0.1766471896	0.3499324347	15405/16384	0.940247
-0.1764595771	0.3497214991	7703/8192	0.940308
-0.1767312666	0.3495076172	15407/16384	0.940369
-0.1764448554	0.3492202968	963/1024	0.94043
-0.1764448554	0.3492202968	963/1024	0.94043
-0.1764419188	0.349215742	1911/2032	0.940453
-0.1764641559	0.3492306162	15409/16384	0.940491
-0.176423499	0.3492750129	7705/8192	0.940552
-0.1763747386	0.3493009396	15411/16384	0.940613
-0.1762554335	0.3491737648	3853/4096	0.940674
-0.1762540858	0.3491690819	1919/2040	0.940686
-0.1762341301	0.3492145774	15413/16384	0.940735
-0.1762423798	0.3492182092	1445/1536	0.940755
-0.1761095087	0.3489428364	7707/8192	0.940796
-0.1761204	0.3489384295	1923/2044	0.940802
-0.1763998071	0.3487830451	15415/16384	0.940857
-0.1763999282	0.3487912299	175/186	0.94086
-0.1768293646	0.3487902342	1927/2048	0.940918
-0.176801687	0.3488013863	271/288	0.940972
-0.1767864095	0.3487827481	15417/16384	0.940979
-0.1767858972	0.3487114801	1867/1984	0.941028
-0.1768313697	0.3486599164	7709/8192	0.94104
-0.1769209274	0.3485512618	15419/16384	0.941101
-0.17711641	0.3487262325	1807/1920	0.941146
-0.1775720734	0.3490654627	3855/4096	0.941162
-0.177888049	0.3477961455	7711/8192	0.941284
-0.1772479587	0.348039061	15423/16384	0.941345
-0.177375281	0.3481538548	241/256	0.941406
-0.177375281	0.3481538548	241/256	0.941406
-0.1773739357	0.3481549981	1913/2032	0.941437
-0.1773718976	0.3481502702	15425/16384	0.941467
-0.1773848814	0.3481439236	7713/8192	0.941528
-0.1773986414	0.3481444098	15427/16384	0.941589
-0.1774033555	0.3481793827	3857/4096	0.94165
-0.1774024061	0.3481794482	113/120	0.941667
-0.1774103425	0.3481762783	15429/16384	0.941711
-0.1774023025	0.3482158464	7715/8192	0.941772
-0.1774018272	0.3482146652	275/292	0.941781
-0.1773662867	0.3482215768	15431/16384	0.941833
-0.1773670544	0.3482209833	1927/2046	0.941838
-0.1773146066	0.348232859	1929/2048	0.941895
-0.1773206492	0.3482311057	15433/16384	0.941956
-0.1773202905	0.348230988	211/224	0.941964
-0.177323961	0.3482490862	7717/8192	0.942017
-0.1773236541	0.3482477688	1869/1984	0.942036
-0.1773271231	0.3482471836	1447/1536	0.942057
-0.1773258507	0.3482706448	15435/16384	0.942078
-0.1772271455	0.348245803	3859/4096	0.942139
-0.1772345065	0.3482595469	603/640	0.942187
-0.1772093791	0.3482677364	15437/16384	0.9422
-0.1771885957	0.3481623976	7719/8192	0.942261
-0.1773038574	0.3480602847	15439/16384	0.942322
-0.177102468	0.3480333561	965/1024	0.942383
-0.177102468	0.3480333561	965/1024	0.942383
-0.1771003078	0.3480311413	1915/2032	0.942421
-0.1771087584	0.3480288074	15441/16384	0.942444
-0.1771155059	0.3480485972	7721/8192	0.942505
-0.1771153924	0.3480474147	1689/1792	0.942522
-0.1771143105	0.348065897	15443/16384	0.942566
-0.1770701799	0.3480820295	3861/4096	0.942627
-0.1770691997	0.3480808064	641/680	0.942647
-0.1770782601	0.3480893732	15445/16384	0.942688
-0.1770184256	0.348118831	7723/8192	0.942749
-0.1770186414	0.3481159924	1927/2044	0.942759
-0.1769357951	0.3480527931	15447/16384	0.94281
-0.1769402687	0.3480532767	643/682	0.942815
-0.1768717261	0.3477712131	1931/2048	0.942871
-0.1768672316	0.3478113415	15449/16384	0.942932
-0.1768791235	0.3478200153	1901/2016	0.942956
-0.1767339756	0.3477883445	7725/8192	0.942993
-0.1767373355	0.3478585209	1871/1984	0.943044
-0.1765411684	0.3477077002	15451/16384	0.943054
-0.17723382	0.347327376	3863/4096	0.943115
-0.1772782999	0.3471436074	15453/16384	0.943176
-0.1776052116	0.3473993722	1811/1920	0.943229
-0.1776910841	0.3479568993	7727/8192	0.943237
-0.178959562	0.3477118313	15455/16384	0.943298
-0.1784219816	0.3472014329	483/512	0.943359
-0.1784219816	0.3472014329	483/512	0.943359
-0.1784307451	0.3471938319	1917/2032	0.943406
-0.1784384051	0.3472084314	15457/16384	0.94342
-0.1784043402	0.3472475462	7729/8192	0.943481
-0.1783601225	0.3472644866	15459/16384	0.943542
-0.1782907751	0.3471662379	3865/4096	0.943604
-0.1782963235	0.3471646702	385/408	0.943627
-0.1782963956	0.3471721443	1691/1792	0.943638
-0.1782761726	0.3471874698	15461/16384	0.943665
-0.178218398	0.3470584564	7731/8192	0.943726
-0.1782244041	0.3470644968	1929/2044	0.943738
-0.1783159363	0.3469495435	15463/16384	0.943787
-0.1783114445	0.3469564081	1931/2046	0.943793
-0.1784823727	0.3467469934	1933/2048	0.943848
-0.17846208	0.3467744834	15465/16384	0.943909
-0.1784283441	0.3467870985	1903/2016	0.943948
-0.1783843512	0.3467106836	7733/8192	0.94397
-0.1782883346	0.3466328547	15467/16384	0.944031
-0.1782506328	0.3466730836	1873/1984	0.944052
-0.1789812067	0.3463386284	3867/4096	0.944092
-0.1790380899	0.3460751284	15469/16384	0.944153
-0.179446959	0.346987695	7735/8192	0.944214
-0.179325051	0.3473529937	1813/1920	0.944271
-0.1787587928	0.347469891	15471/16384	0.944275
-0.1795843407	0.3480434076	967/1024	0.944336
-0.1795843407	0.3480434076	967/1024	0.944336
-0.1795611933	0.3480555874	1919/2032	0.94439
-0.1795447566	0.3480404516	15473/16384	0.944397
-0.1795854196	0.3479360364	7737/8192	0.944458
-0.1796565231	0.3478648657	15475/16384	0.944519
-0.17990971	0.3480002727	3869/4096	0.94458
-0.1798930546	0.3480022777	1927/2040	0.944608
-0.1799170118	0.3479332472	15477/16384	0.944641
-0.1799040248	0.347932601	1451/1536	0.944661
-0.1802203468	0.3481866847	7739/8192	0.944702
-0.1802071207	0.348161305	1931/2044	0.944716
-0.1800841448	0.34861033	15479/16384	0.944763
-0.1801083289	0.3485955274	1933/2046	0.94477
-0.179071029	0.3498047011	1935/2048	0.944824
-0.1795548654	0.3496597426	15481/16384	0.944885
-0.180253763	0.3498876829	635/672	0.94494
-0.1803293256	0.3496965594	7741/8192	0.944946
-0.1807436684	0.3496234444	15483/16384	0.945007
-0.1813607016	0.3524681892	1875/1984	0.94506
-0.1825118257	0.3507073094	3871/4096	0.945068
-0.1818735954	0.3496133554	15485/16384	0.945129
-0.1817906866	0.3487260452	7743/8192	0.94519
-0.1813662951	0.3490350785	15487/16384	0.945251
-0.1814903918	0.3491475301	121/128	0.945312
-0.1814903918	0.3491475301	121/128	0.945312
-0.18148625	0.3491456892	15489/16384	0.945374
-0.181486253	0.3491456937	1921/2032	0.945374
-0.1814954478	0.3491358192	7745/8192	0.945435
-0.1815076174	0.3491318418	15491/16384	0.945496
-0.1815237037	0.3491617054	3873/4096	0.945557
-0.1815222928	0.349159657	643/680	0.945588
-0.1815288198	0.3491562719	15493/16384	0.945618
-0.1815349397	0.3491967678	7747/8192	0.945679
-0.1815372341	0.3491938103	1933/2044	0.945695
-0.1815006266	0.3492132094	15495/16384	0.94574
-0.1815031273	0.3492146309	645/682	0.945748
-0.181449179	0.3492398265	1937/2048	0.945801
-0.181454979	0.3492361512	15497/16384	0.945862
-0.1814545651	0.3492361669	1695/1792	0.945871
-0.1814636381	0.349254768	7749/8192	0.945923
-0.18146313	0.3492550807	1907/2016	0.945933
-0.1814664306	0.3492517188	1453/1536	0.945964
-0.1814715414	0.3492783964	15499/16384	0.945984
-0.1813528986	0.3492651643	3875/4096	0.946045
-0.1813586586	0.3492628952	1877/1984	0.946069
-0.181333374	0.349292041	15501/16384	0.946106
-0.1813136162	0.3491742319	7751/8192	0.946167
-0.1814069953	0.3491008893	15503/16384	0.946228
-0.1812449013	0.3490463869	969/1024	0.946289
-0.1812449013	0.3490463869	969/1024	0.946289
-0.1812502578	0.3490429559	15505/16384	0.94635
-0.1812502449	0.3490431154	1817/1920	0.946354
-0.181249834	0.3490429396	1923/2032	0.946358
-0.1812545092	0.3490602162	7753/8192	0.946411
-0.1812515906	0.3490751218	15507/16384	0.946472
-0.1812099609	0.3490827638	3877/4096	0.946533
-0.1812128201	0.3490813558	1931/2040	0.946569
-0.1812160428	0.349090575	15509/16384	0.946594
-0.1811543556	0.3491025327	7755/8192	0.946655
-0.1811601023	0.3491049926	1935/2044	0.946673
-0.1811108116	0.3490189337	15511/16384	0.946716
-0.1811058614	0.3490258233	1937/2046	0.946725
-0.1811585794	0.3488256027	1939/2048	0.946777
-0.181146899	0.3488448594	15513/16384	0.946838
-0.1810907708	0.3487935972	7757/8192	0.946899
-0.181094791	0.3488039829	1909/2016	0.946925
-0.1810530289	0.3486978908	15515/16384	0.94696
-0.1813554119	0.3486817919	3879/4096	0.947021
-0.1813403663	0.34864581	1879/1984	0.947077
-0.1813625675	0.3486236831	15517/16384	0.947083
-0.1816064937	0.3489000875	7759/8192	0.947144
-0.1819788196	0.3481569349	15519/16384	0.947205
-0.1816307981	0.3483733962	485/512	0.947266
-0.1816307981	0.3483733962	485/512	0.947266
-0.181634475	0.3483674864	15521/16384	0.947327
-0.1816335913	0.3483663496	1925/2032	0.947343
-0.1816472561	0.3483840138	7761/8192	0.947388
-0.181646801	0.3483841804	1819/1920	0.947396
-0.1816492855	0.3484033005	15523/16384	0.947449
-0.1816040684	0.3484175344	3881/4096	0.94751
-0.1816068978	0.3484155508	1933/2040	0.947549
-0.1816099505	0.3484252692	15525/16384	0.947571
-0.1815593383	0.3484272696	7763/8192	0.947632
-0.181563223	0.3484295938	1937/2044	0.947652
-0.1815379039	0.3483857858	15527/16384	0.947693
-0.1815370367	0.3483895074	1939/2046	0.947703
-0.1814872021	0.3483265045	1941/2048	0.947754
-0.1814947609	0.3483325263	15529/16384	0.947815
-0.1814750559	0.3483519705	7765/8192	0.947876
-0.1814799568	0.3483539912	91/96	0.947917
-0.1814519042	0.3483721152	15531/16384	0.947937
-0.1813626444	0.3482176735	3883/4096	0.947998
-0.1813039571	0.3482366491	15533/16384	0.948059
-0.181311178	0.3482663898	1881/1984	0.948085
-0.1814881562	0.3479754537	7767/8192	0.94812
-0.181745148	0.3482319747	15535/16384	0.948181
-0.1821569195	0.3476337874	971/1024	0.948242
-0.1821569195	0.3476337874	971/1024	0.948242
-0.1821616832	0.3476707412	15537/16384	0.948303
-0.1821752695	0.347678489	1927/2032	0.948327
-0.1820580536	0.3476542527	7769/8192	0.948364
-0.1819768314	0.3476079789	15539/16384	0.948425
-0.181975313	0.3476242297	607/640	0.948438
-0.1820221602	0.3473103849	3885/4096	0.948486
-0.1820337333	0.3473411898	129/136	0.948529
-0.181948087	0.3473331719	15541/16384	0.948547
-0.1819536062	0.3473465848	1457/1536	0.948568
-0.182100791	0.3467882615	7771/8192	0.948608
-0.1820542811	0.3468570628	277/292	0.94863
-0.1829262765	0.3469743843	15543/16384	0.948669
-0.1828746725	0.3468704824	647/682	0.94868
-0.1834815509	0.3483105346	1943/2048	0.94873
-0.1834847885	0.3481644909	15545/16384	0.948792
-0.1839788178	0.3482978836	7773/8192	0.948853
-0.1845096351	0.3481473838	1913/2016	0.948909
-0.1844250888	0.348777249	15547/16384	0.948914
-0.1823036863	0.3495832592	3887/4096	0.948975
-0.1832288137	0.3506179636	15549/16384	0.949036
-0.1813607016	0.3524681892	1883/1984	0.949093
-0.183121104	0.3530269134	7775/8192	0.949097
-0.1854915416	0.3517950929	15551/16384	0.949158
-0.1846740851	0.3514699887	243/256	0.949219
-0.1846740851	0.3514699887	243/256	0.949219
-0.1846931096	0.3514673283	15553/16384	0.94928
-0.1847076801	0.3514804523	1929/2032	0.949311
-0.1846794663	0.351523818	7777/8192	0.949341
-0.1846402861	0.3515624487	15555/16384	0.949402
-0.1845261722	0.3514775368	3889/4096	0.949463
-0.1845279956	0.3514741411	1823/1920	0.949479
-0.1845374828	0.3514909599	1937/2040	0.94951
-0.1845169423	0.3515067274	15557/16384	0.949524
-0.1844314012	0.3513696618	7779/8192	0.949585
-0.1844180948	0.3513908661	1941/2044	0.949609
-0.1845231903	0.3512608573	15559/16384	0.949646
-0.1845054513	0.3512539984	1943/2046	0.949658
-0.1846425753	0.3510735319	1945/2048	0.949707
-0.1846326567	0.3510977856	15561/16384	0.949768
-0.1845669977	0.3510566218	7781/8192	0.949829
-0.1845647607	0.3510717428	1459/1536	0.94987
-0.184498186	0.3509993427	15563/16384	0.94989
-0.1845035934	0.3510107547	1915/2016	0.949901
-0.1848829681	0.3507814212	3891/4096	0.949951
-0.1848671213	0.3506559549	15565/16384	0.950012
-0.1852505356	0.3509744008	7783/8192	0.950073
-0.1852957995	0.350922941	1885/1984	0.950101
-0.1850687045	0.3514293183	15567/16384	0.950134
-0.1859952524	0.3512627137	973/1024	0.950195
-0.1859952524	0.3512627137	973/1024	0.950195
-0.1859882404	0.3513025431	15569/16384	0.950256
-0.1859466257	0.3513321859	1931/2032	0.950295
-0.1858921949	0.3512426285	7785/8192	0.950317
-0.1858972649	0.3512465092	1703/1792	0.950335
-0.1858440809	0.3511631229	15571/16384	0.950378
-0.1859916221	0.3509499452	3893/4096	0.950439
-0.1859694103	0.3509850813	1939/2040	0.95049
-0.1859314377	0.3509468926	15573/16384	0.9505
-0.1859318478	0.3509582427	365/384	0.950521
-0.1861218661	0.350608864	7787/8192	0.950562
-0.1860413559	0.3506372154	1943/2044	0.950587
-0.1867577884	0.3507456565	15575/16384	0.950623
-0.1867470468	0.350581265	1945/2046	0.950635
-0.1875448751	0.3523853037	1947/2048	0.950684
-0.1875287293	0.3521560531	15577/16384	0.950745
-0.1883641072	0.3522884916	7789/8192	0.950806
-0.18937562	0.3531395806	15579/16384	0.950867
-0.1859896871	0.3540871341	3895/4096	0.950928
-0.1858577771	0.3546501202	15581/16384	0.950989
-0.1845776612	0.3527158197	7791/8192	0.95105
-0.1813607016	0.3524681892	1887/1984	0.951109
-0.1813393505	0.3541876429	15583/16384	0.951111
-0.182898408	0.3551499202	487/512	0.951172
-0.182898408	0.3551499202	487/512	0.951172
-0.1828504598	0.3551643419	15585/16384	0.951233
-0.1828333268	0.3550931402	1933/2032	0.95128
-0.1828670049	0.355021444	7793/8192	0.951294
-0.1829460865	0.3549227287	15587/16384	0.951355
-0.183228558	0.3550673645	3897/4096	0.951416
-0.1832062888	0.355062351	1705/1792	0.951451
-0.1832097024	0.355028743	647/680	0.951471
-0.1832346299	0.3549986229	15589/16384	0.951477
-0.1834914047	0.3552388895	7795/8192	0.951538
-0.183499468	0.3551802925	609/640	0.951562
-0.1835351532	0.3551897352	1945/2044	0.951566
-0.183372742	0.3555363224	15591/16384	0.951599
-0.183417119	0.3555663215	59/62	0.951613
-0.1832140454	0.3561016467	1949/2048	0.95166
-0.1832203065	0.3560231444	15593/16384	0.951721
-0.1834347226	0.3560770482	7797/8192	0.951782
-0.1836718643	0.3561552971	15595/16384	0.951843
-0.183750227	0.3568240923	1919/2016	0.951885
-0.1827770406	0.3571144537	3899/4096	0.951904
-0.1829321435	0.357482968	15597/16384	0.951965
-0.1815242778	0.3568246124	7799/8192	0.952026
-0.1817793603	0.3554183315	15599/16384	0.952087
-0.1813607016	0.3524681892	1889/1984	0.952117
-0.1785602138	0.3547685865	975/1024	0.952148
-0.1785602138	0.3547685865	975/1024	0.952148
-0.1788074974	0.3546554258	15601/16384	0.952209
-0.1787587331	0.3550353722	1935/2032	0.952264
-0.1789729867	0.355316328	7801/8192	0.952271
-0.179030062	0.3558641522	15603/16384	0.952332
-0.1779531891	0.3572257751	3901/4096	0.952393
-0.1782164091	0.3572288478	1943/2040	0.952451
-0.1783602964	0.3571795442	15605/16384	0.952454
-0.1783524718	0.3571009474	1463/1536	0.952474
-0.1779905808	0.3588587804	7803/8192	0.952515
-0.1782518924	0.3590675311	1947/2044	0.952544
-0.1768206641	0.3598862994	15607/16384	0.952576
-0.1767486443	0.3602825259	1949/2046	0.95259
-0.175868585	0.3602294882	1829/1920	0.952604
-0.174420234	0.3630789139	1951/2048	0.952637
-0.1747976791	0.3625421122	15609/16384	0.952698
-0.1762846051	0.3638183933	7805/8192	0.952759
-0.1786303322	0.3635576508	15611/16384	0.95282
-0.1817401025	0.3630154023	1921/2016	0.952877
-0.181593549	0.3634334304	3903/4096	0.952881
-0.1814891333	0.3626597751	15613/16384	0.952942
-0.1805398742	0.3613631673	7807/8192	0.953003
-0.179793442	0.3616229538	15615/16384	0.953064
-0.1799930903	0.3618572593	61/64	0.953125
-0.1799930903	0.3618572593	61/64	0.953125
-0.179980848	0.3618571276	15617/16384	0.953186
-0.1799948588	0.3618269198	7809/8192	0.953247
-0.1799948299	0.3618269856	1937/2032	0.953248
-0.1800183696	0.3618108636	15619/16384	0.953308
-0.180068616	0.3618645024	3905/4096	0.953369
-0.1800762633	0.3618490785	15621/16384	0.95343
-0.1800761621	0.3618490325	389/408	0.953431
-0.180107722	0.3619246716	7811/8192	0.953491
-0.180133249	0.3619313447	1949/2044	0.953523
-0.1800562224	0.3619700158	15623/16384	0.953552
-0.1800541738	0.3619874582	1951/2046	0.953568
-0.1799645626	0.3620489209	1953/2048	0.953613
-0.1799590561	0.3620442447	1831/1920	0.953646
-0.1799753074	0.3620358822	15625/16384	0.953674
-0.1799741387	0.3620363326	1709/1792	0.953683
-0.1800040038	0.3620711186	7813/8192	0.953735
-0.1800080994	0.3620622395	1465/1536	0.953776
-0.1800318854	0.3621131282	15627/16384	0.953796
-0.1797983077	0.3621394693	3907/4096	0.953857
-0.1797936998	0.3621342624	641/672	0.953869
-0.1797728708	0.3622050494	15629/16384	0.953918
-0.1796948928	0.3619929511	7815/8192	0.953979
-0.1797898729	0.3618694091	15631/16384	0.954041
-0.1795322948	0.3617403065	977/1024	0.954102
-0.1795322948	0.3617403065	977/1024	0.954102
-0.1795270614	0.3617352059	1893/1984	0.954133
-0.1795454667	0.3617285057	15633/16384	0.954163
-0.1795592644	0.3617709219	7817/8192	0.954224
-0.1795579924	0.3617712253	1939/2032	0.954232
-0.1795546986	0.3618044997	15635/16384	0.954285
-0.1794631241	0.3618258854	3909/4096	0.954346
-0.1794795378	0.3618432867	15637/16384	0.954407
-0.1794788283	0.361843863	649/680	0.954412
-0.1793485427	0.3618741296	7819/8192	0.954468
-0.1793372557	0.3619271205	1951/2044	0.954501
-0.1792567151	0.3617146201	15639/16384	0.954529
-0.1792068996	0.3616754661	21/22	0.954545
-0.1793891197	0.3613296771	1955/2048	0.95459
-0.1793602808	0.3613714784	15641/16384	0.954651
-0.1793208829	0.3613867638	611/640	0.954688
-0.179260775	0.361248526	7821/8192	0.954712
-0.1792284438	0.3610531927	15643/16384	0.954773
-0.1797332812	0.3611498729	3911/4096	0.954834
-0.1797100677	0.361155653	275/288	0.954861
-0.1797640579	0.3610615848	15645/16384	0.954895
-0.1799902114	0.3613786014	7823/8192	0.954956
-0.1806982764	0.3608958714	15647/16384	0.955017
-0.1802607385	0.3608279874	489/512	0.955078
-0.1802607385	0.3608279874	489/512	0.955078
-0.1802698335	0.3608175921	15649/16384	0.955139
-0.1802700221	0.3608175146	1895/1984	0.955141
-0.180284982	0.3608525441	7825/8192	0.9552
-0.1802844722	0.3608497353	1941/2032	0.955217
-0.1802793579	0.3608842454	15651/16384	0.955261
-0.1802019669	0.3608835487	3913/4096	0.955322
-0.180207978	0.3608994206	15653/16384	0.955383
-0.1802079142	0.3608981331	1949/2040	0.955392
-0.1801343854	0.3608757794	7827/8192	0.955444
-0.1801180406	0.3608888564	279/292	0.955479
-0.1801259758	0.360812484	15655/16384	0.955505
-0.1801135527	0.3608038502	1955/2046	0.955523
-0.1800903667	0.3606966605	1957/2048	0.955566
-0.1800996555	0.3607115925	15657/16384	0.955627
-0.1800572557	0.3607280909	7829/8192	0.955688
-0.1800641281	0.3607343687	367/384	0.955729
-0.1800131557	0.3607428319	15659/16384	0.95575
-0.1799995499	0.3604810599	3915/4096	0.955811
-0.1799973553	0.3605200353	1927/2016	0.955853
-0.179903383	0.3604646921	15661/16384	0.955872
-0.1802869237	0.3603064958	7831/8192	0.955933
-0.1804256156	0.3605969654	15663/16384	0.955994
-0.1810287707	0.3604450854	979/1024	0.956055
-0.1810287707	0.3604450854	979/1024	0.956055
-0.1810140824	0.3604810795	15665/16384	0.956116
-0.1809818631	0.3604886245	1897/1984	0.956149
-0.1809408012	0.3604099137	7833/8192	0.956177
-0.1809448622	0.3604214369	1943/2032	0.956201
-0.1809095584	0.3603311745	15667/16384	0.956238
-0.1811182114	0.3601778841	3917/4096	0.956299
-0.181057836	0.3601434163	15669/16384	0.95636
-0.1810622433	0.3601529472	1951/2040	0.956373
-0.181052112	0.3601566259	1469/1536	0.95638
-0.1814404364	0.360019826	7835/8192	0.956421
-0.1814660422	0.3598894871	1955/2044	0.956458
-0.1816094674	0.3603942946	15671/16384	0.956482
-0.1817021049	0.3604382592	1957/2046	0.9565
-0.1815673404	0.3610485255	1959/2048	0.956543
-0.1815743154	0.3609727115	15673/16384	0.956604
-0.1817780425	0.3610518244	7837/8192	0.956665
-0.1819471832	0.3612024362	15675/16384	0.956726
-0.1816533062	0.3614644637	1837/1920	0.956771
-0.1811660319	0.3617563811	3919/4096	0.956787
-0.1811925661	0.3618943967	643/672	0.956845
-0.1811578883	0.3622480863	15677/16384	0.956848
-0.1833405241	0.363522373	7839/8192	0.956909
-0.183190816	0.3616494913	15679/16384	0.95697
-0.182861934	0.3619796263	245/256	0.957031
-0.182861934	0.3619796263	245/256	0.957031
-0.1828627092	0.3619640205	15681/16384	0.957092
-0.18290186	0.3619844054	7841/8192	0.957153
-0.1829023908	0.3619846686	1899/1984	0.957157
-0.1829060105	0.361975941	1945/2032	0.957185
-0.1829217568	0.3620185036	15683/16384	0.957214
-0.1828384753	0.3620790761	3921/4096	0.957275
-0.1828580239	0.362092815	15685/16384	0.957336
-0.1828615729	0.3620890544	651/680	0.957353
-0.1827468348	0.3621126691	7843/8192	0.957397
-0.1827353924	0.3621488279	1957/2044	0.957436
-0.1827077164	0.3620334651	15687/16384	0.957458
-0.1826850875	0.3620298596	653/682	0.957478
-0.1826378965	0.3619100195	1961/2048	0.95752
-0.1826502085	0.3619235882	15689/16384	0.957581
-0.1826060339	0.3619475259	7845/8192	0.957642
-0.1826146006	0.3619537987	1471/1536	0.957682
-0.1825544242	0.3619653997	15691/16384	0.957703
-0.1825706298	0.3617298256	3923/4096	0.957764
-0.1825451834	0.3617566086	613/640	0.957812
-0.182513955	0.3617027184	15693/16384	0.957825
-0.1825182313	0.3617127537	1931/2016	0.957837
-0.182715274	0.3616305695	7847/8192	0.957886
-0.1828547536	0.3617359702	15695/16384	0.957947
-0.1829344846	0.3613848818	981/1024	0.958008
-0.1829344846	0.3613848818	981/1024	0.958008
-0.1829532387	0.3613915297	15697/16384	0.958069
-0.1829162618	0.3614275212	7849/8192	0.95813
-0.1829188885	0.3614254073	1717/1792	0.958147
-0.1829225524	0.3614337859	1901/1984	0.958165
-0.182924585	0.3614333246	1947/2032	0.958169
-0.1828789709	0.3614374055	15699/16384	0.958191
-0.1828097224	0.3613791516	15701/16384	0.958313
-0.1828144184	0.3613805391	23/24	0.958333
-0.1827272394	0.3612781007	7851/8192	0.958374
-0.1826879985	0.3613035348	1959/2044	0.958415
-0.1828072914	0.361123908	15703/16384	0.958435
-0.1827838139	0.3610654775	1961/2046	0.958456
-0.183258084	0.3608807877	1963/2048	0.958496
-0.1831867563	0.3609083333	15705/16384	0.958557
-0.1831461579	0.3606761198	7853/8192	0.958618
-0.183175196	0.3603631605	15707/16384	0.958679
-0.1840924441	0.36116991	3927/4096	0.95874
-0.1844055635	0.3610814837	15709/16384	0.958801
-0.1846919873	0.3608775738	1933/2016	0.958829
-0.184266042	0.3617231026	1841/1920	0.958854
-0.1836642973	0.3619827259	7855/8192	0.958862
-0.1839719174	0.3650785853	15711/16384	0.958923
-0.1856942715	0.3634591138	491/512	0.958984
-0.1856942715	0.3634591138	491/512	0.958984
-0.1857412726	0.3635181312	15713/16384	0.959045
-0.1855323652	0.3635536885	7857/8192	0.959106
-0.1855182954	0.3636403082	1949/2032	0.959154
-0.1853777692	0.3634752254	15715/16384	0.959167
-0.1853909359	0.3634771682	1903/1984	0.959173
-0.1854868603	0.3630743659	3929/4096	0.959229
-0.1854902048	0.3631058585	1719/1792	0.959263
-0.1853980203	0.3630904419	15717/16384	0.95929
-0.1853931852	0.3631258195	1957/2040	0.959314
-0.18560681	0.3627225598	7859/8192	0.959351
-0.1854861648	0.3626296085	1961/2044	0.959393
-0.1859750304	0.3627572629	15719/16384	0.959412
-0.1860282609	0.3626449293	1963/2046	0.959433
-0.1867921611	0.3626786296	1965/2048	0.959473
-0.1866796656	0.362729228	15721/16384	0.959534
-0.1866128156	0.3624081847	7861/8192	0.959595
-0.186555603	0.3620742518	15723/16384	0.959656
-0.1886952907	0.3626113449	3931/4096	0.959717
-0.1891614829	0.3618575717	15725/16384	0.959778
-0.1885415751	0.3653449849	7863/8192	0.959839
-0.1872711795	0.3659033721	1843/1920	0.959896
-0.1865279419	0.3647411798	15727/16384	0.9599
-0.1840314656	0.3678856433	983/1024	0.959961
-0.1840314656	0.3678856433	983/1024	0.959961
-0.1839671977	0.367644847	15729/16384	0.960022
-0.1846087744	0.3677565825	7865/8192	0.960083
-0.1848640723	0.3675592516	1951/2032	0.960138
-0.1850478985	0.368074032	15731/16384	0.960144
-0.184889853	0.3686051283	1905/1984	0.960181
-0.1842805961	0.3696042446	3933/4096	0.960205
-0.1847623278	0.3696332197	15733/16384	0.960266
-0.1847510969	0.369527514	1475/1536	0.960286
-0.1850054538	0.3694567986	653/680	0.960294
-0.1827560784	0.3710421053	7867/8192	0.960327
-0.1825778211	0.3729880512	1963/2044	0.960372
-0.1813612749	0.369548317	15735/16384	0.960388
-0.1804350677	0.3693235319	655/682	0.960411
-0.1802873219	0.3659354259	1967/2048	0.960449
-0.1803424191	0.3664201444	15737/16384	0.96051
-0.1786471845	0.3661205154	7869/8192	0.960571
-0.175920383	0.3670656318	15739/16384	0.960632
-0.1705762777	0.3663228656	3935/4096	0.960693
-0.1707634631	0.3677143402	15741/16384	0.960754
-0.1713549733	0.3741962696	1937/2016	0.960813
-0.1707731134	0.3740761998	7871/8192	0.960815
-0.1743441288	0.3724397555	15743/16384	0.960876
-0.1732927639	0.3716514147	123/128	0.960938
-0.1732927639	0.3716514147	123/128	0.960938
-0.1733664453	0.3716308327	15745/16384	0.960999
-0.1733306764	0.3718176464	7873/8192	0.96106
-0.1732307949	0.3719334338	15747/16384	0.961121
-0.1732294227	0.3719371183	1953/2032	0.961122
-0.172915229	0.37170289	3937/4096	0.961182
-0.1729060525	0.3716990335	1907/1984	0.96119
-0.1728845431	0.371796796	15749/16384	0.961243
-0.172804314	0.3718704644	1961/2040	0.961275
-0.1726910119	0.3714444493	7875/8192	0.961304
-0.1724915525	0.3712699885	1965/2044	0.96135
-0.1728823881	0.3712219954	15751/16384	0.961365
-0.1729391772	0.3710976873	1967/2046	0.961388
-0.173252524	0.3708635141	1969/2048	0.961426
-0.1732063277	0.37092899	15753/16384	0.961487
-0.173212998	0.3709263923	1723/1792	0.961496
-0.1730800786	0.3707822718	7877/8192	0.961548
-0.1730624972	0.370823488	1477/1536	0.961589
-0.172966513	0.3706204731	15755/16384	0.961609
-0.1737705218	0.3704794759	3939/4096	0.96167
-0.1738256845	0.3702521957	15757/16384	0.961731
-0.1741761637	0.3708419858	7879/8192	0.961792
-0.1741490815	0.3708071425	277/288	0.961806
-0.1740376359	0.3712439964	15759/16384	0.961853
-0.1749372433	0.3714956738	985/1024	0.961914
-0.1749372433	0.3714956738	985/1024	0.961914
-0.1749065804	0.3715687824	15761/16384	0.961975
-0.1749044956	0.3715653311	1847/1920	0.961979
-0.1747935099	0.371426358	7881/8192	0.962036
-0.1747703463	0.3713073854	15763/16384	0.962097
-0.1747627728	0.3713201007	1955/2032	0.962106
-0.1750397835	0.3711382537	3941/4096	0.962158
-0.1750206823	0.3711740471	1909/1984	0.962198
-0.1749643364	0.3711017677	15765/16384	0.962219
-0.1749194023	0.3710527848	1963/2040	0.962255
-0.1753033253	0.3708780851	7883/8192	0.96228
-0.1753067455	0.3705582971	281/292	0.962329
-0.1757133512	0.3711546592	15767/16384	0.962341
-0.1760271568	0.3712947908	179/186	0.962366
-0.1759423788	0.3723893176	1971/2048	0.962402
-0.1759353078	0.3721992812	15769/16384	0.962463
-0.17644331	0.3723455814	7885/8192	0.962524
-0.1769063338	0.3727432088	15771/16384	0.962585
-0.1753684999	0.3734935993	3943/4096	0.962646
-0.175464745	0.3738419295	15773/16384	0.962708
-0.1743570081	0.3733318009	7887/8192	0.962769
-0.17425834	0.3734825759	647/672	0.962798
-0.1711355122	0.3759858409	15775/16384	0.96283
-0.173907796	0.3760326371	493/512	0.962891
-0.173907796	0.3760326371	493/512	0.962891
-0.1738996647	0.376174943	15777/16384	0.962952
-0.1736161285	0.3759636524	7889/8192	0.963013
-0.1736294791	0.3759522197	1849/1920	0.963021
-0.1735509214	0.3757168074	15779/16384	0.963074
-0.1734872049	0.3756573688	1957/2032	0.963091
-0.1740652036	0.3755030732	3945/4096	0.963135
-0.1739753832	0.3754153618	15781/16384	0.963196
-0.173983722	0.375428007	1911/1984	0.963206
-0.1739030222	0.3752782313	131/136	0.963235
-0.1744339595	0.37537037	7891/8192	0.963257
-0.1746540394	0.3751462527	1969/2044	0.963307
-0.1746297588	0.3756269905	15783/16384	0.963318
-0.1748164693	0.3756974064	657/682	0.963343
-0.1751701484	0.3761209118	1973/2048	0.963379
-0.175043283	0.3760748306	15785/16384	0.96344
-0.1752166725	0.3758366323	7893/8192	0.963501
-0.1753672502	0.3756324204	15787/16384	0.963562
-0.1762911227	0.3767019708	3947/4096	0.963623
-0.1767467558	0.3763519506	15789/16384	0.963684
-0.1758352894	0.3784357044	7895/8192	0.963745
-0.1765332441	0.3799099025	1943/2016	0.96379
-0.1744220588	0.3779094786	15791/16384	0.963806
-0.1707015017	0.3799038043	987/1024	0.963867
-0.1707015017	0.3799038043	987/1024	0.963867
-0.170690673	0.3794139675	15793/16384	0.963928
-0.1716326314	0.3798751649	7897/8192	0.963989
-0.1721205302	0.3803988406	15795/16384	0.96405
-0.1721740769	0.3802202725	617/640	0.964063
-0.1726648654	0.380499106	1959/2032	0.964075
-0.170830676	0.3822755619	3949/4096	0.964111
-0.1715646841	0.3823746451	15797/16384	0.964172
-0.1715650189	0.382196992	1481/1536	0.964193
-0.1723440477	0.3823897289	1913/1984	0.964214
-0.172796047	0.3822713426	1967/2040	0.964216
-0.1688311985	0.3842955352	7899/8192	0.964233
-0.1667152446	0.3823086894	15799/16384	0.964294
-0.1654388573	0.3800523063	1973/2046	0.964321
-0.1665592423	0.3770751615	1975/2048	0.964355
-0.1664899675	0.37780583	15801/16384	0.964417
-0.1649372608	0.3769637289	7901/8192	0.964478
-0.1640074056	0.3756753826	15803/16384	0.964539
-0.1679336588	0.3736787922	3951/4096	0.9646
-0.1673985302	0.3725514173	15805/16384	0.964661
-0.1664465445	0.3651633352	7903/8192	0.964722
-0.1614041999	0.3674899307	1945/2016	0.964782
-0.1613594954	0.3670649576	15807/16384	0.964783
-0.1631954848	0.3685282805	247/256	0.964844
-0.1631954848	0.3685282805	247/256	0.964844
-0.1630401234	0.3685350009	15809/16384	0.964905
-0.1631689516	0.3682066466	7905/8192	0.964966
-0.1633688019	0.3680283144	15811/16384	0.965027
-0.1635488705	0.3681646876	1961/2032	0.965059
-0.1638418696	0.3684408272	3953/4096	0.965088
-0.1638164202	0.3684632407	1853/1920	0.965104
-0.1639057382	0.3682993615	15813/16384	0.965149
-0.1641748585	0.3683132048	1969/2040	0.965196
-0.1642090418	0.3688087317	7907/8192	0.96521
-0.1641685092	0.3687665601	1915/1984	0.965222
-0.1643813415	0.3691651467	1973/2044	0.965264
-0.1639853511	0.3691884185	15815/16384	0.965271
-0.1638408601	0.3693672783	1975/2046	0.965298
-0.1635116672	0.3698031558	1977/2048	0.965332
-0.1635826814	0.3696894027	15817/16384	0.965393
-0.1638023092	0.3698829633	7909/8192	0.965454
-0.1638230565	0.369815268	1483/1536	0.965495
-0.1640194937	0.3700751414	15819/16384	0.965515
-0.1629622411	0.3706398577	3955/4096	0.965576
-0.163011854	0.3710135685	15821/16384	0.965637
-0.1621061935	0.3704234931	7911/8192	0.965698
-0.1619349103	0.3697480231	15823/16384	0.965759
-0.1617882487	0.3697286871	649/672	0.965774
-0.160429283	0.3697280917	989/1024	0.96582
-0.160429283	0.3697280917	989/1024	0.96582
-0.1605210588	0.3695576194	15825/16384	0.965881
-0.1607552519	0.3698450161	7913/8192	0.965942
-0.1607426838	0.3698159784	1731/1792	0.96596
-0.1608468574	0.3700547561	15827/16384	0.966003
-0.1607261436	0.3702517436	1963/2032	0.966043
-0.160435222	0.3705059387	3957/4096	0.966064
-0.160609476	0.3705447641	15829/16384	0.966125
-0.1606191467	0.3705063033	371/384	0.966146
-0.1607755671	0.3708920654	657/680	0.966176
-0.1601747662	0.3712034845	7915/8192	0.966187
-0.1605493255	0.3713859498	1917/1984	0.96623
-0.1597007277	0.3724838197	1975/2044	0.966243
-0.1591252011	0.3711919787	15831/16384	0.966248
-0.1584283172	0.3705008752	659/682	0.966276
-0.1577795697	0.3688613842	1979/2048	0.966309
-0.157831686	0.3693308921	15833/16384	0.96637
-0.1566911678	0.3692410365	7917/8192	0.966431
-0.155518484	0.3687737066	15835/16384	0.966492
-0.1577749745	0.3660823524	3959/4096	0.966553
-0.1573033542	0.3653630032	15837/16384	0.966614
-0.1599595441	0.3651131765	7919/8192	0.966675
-0.1649151971	0.3603566078	15839/16384	0.966736
-0.1589564305	0.3583766012	1949/2016	0.966766
-0.1598125611	0.3601166614	495/512	0.966797
-0.1598125611	0.3601166614	495/512	0.966797
-0.1600087065	0.3599099718	15841/16384	0.966858
-0.1602971395	0.3604770845	7921/8192	0.966919
-0.1603111196	0.3609471965	15843/16384	0.96698
-0.1596928413	0.3609331571	1965/2032	0.967028
-0.1593427492	0.3612133625	3961/4096	0.967041
-0.1594306757	0.3611879677	1733/1792	0.967076
-0.1594702387	0.3614045221	15845/16384	0.967102
-0.1590421481	0.3616071024	1973/2040	0.967157
-0.1586170301	0.3615561329	7923/8192	0.967163
-0.1587250871	0.3616954556	619/640	0.967187
-0.1581328494	0.361424238	1977/2044	0.967221
-0.1580510581	0.3611146996	15847/16384	0.967224
-0.1579241152	0.3611957537	1919/1984	0.967238
-0.1579322145	0.3607606363	1979/2046	0.967253
-0.1570158609	0.3602921018	1981/2048	0.967285
-0.1571984916	0.3604355263	15849/16384	0.967346
-0.1568934761	0.36082262	7925/8192	0.967407
-0.1566361975	0.3612447193	15851/16384	0.967468
-0.1549390121	0.3598133108	3963/4096	0.967529
-0.1543345351	0.3602212171	15853/16384	0.96759
-0.1538449363	0.3577749771	7927/8192	0.967651
-0.1544578086	0.3550611592	15855/16384	0.967712
-0.1489557123	0.3534210145	1951/2016	0.967758
-0.1503695948	0.353793723	991/1024	0.967773
-0.1503695948	0.353793723	991/1024	0.967773
-0.1507805403	0.3536183947	15857/16384	0.967834
-0.1510094309	0.3544486442	7929/8192	0.967896
-0.1510670786	0.35505632	15859/16384	0.967957
-0.1496422801	0.355446354	1967/2032	0.968012
-0.1498437212	0.3557496241	3965/4096	0.968018
-0.1501130187	0.3559876823	15861/16384	0.968079
-0.1501719002	0.3559398672	1487/1536	0.968099
-0.1490463291	0.3565596222	395/408	0.968137
-0.1490362371	0.3568529558	7931/8192	0.96814
-0.1478328289	0.356758675	1979/2044	0.9682
-0.1476737988	0.3569617058	15863/16384	0.968201
-0.1467142267	0.356710496	1859/1920	0.968229
-0.146933618	0.3559893745	1981/2046	0.968231
-0.145970029	0.3552690887	1921/1984	0.968246
-0.1444132192	0.3570695252	1983/2048	0.968262
-0.1451379827	0.3571573804	15865/16384	0.968323
-0.1452995049	0.3583930607	7933/8192	0.968384
-0.1457270126	0.3592860661	15867/16384	0.968445
-0.1446735963	0.3628669508	3967/4096	0.968506
-0.1462307762	0.3622463575	15869/16384	0.968567
-0.1486890124	0.3624545404	7935/8192	0.968628
-0.1486788262	0.3605867939	15871/16384	0.968689
-0.1477976262	0.3608218799	31/32	0.96875
-0.1477976262	0.3608218799	31/32	0.96875
-0.1478361455	0.3607938456	15873/16384	0.968811
-0.1478739919	0.3608777768	7937/8192	0.968872
-0.1478859509	0.3609470944	15875/16384	0.968933
-0.1477354768	0.3610023196	3969/4096	0.968994
-0.1477359281	0.3610036266	1969/2032	0.968996
-0.1477571779	0.361038997	15877/16384	0.969055
-0.1476051828	0.3610671827	7939/8192	0.969116
-0.1476029234	0.3610684805	659/680	0.969118
-0.1475088275	0.3609795438	15879/16384	0.969177
-0.1475080137	0.3609779049	283/292	0.969178
-0.1475178966	0.3608896577	661/682	0.969208
-0.1474166193	0.3607982869	1985/2048	0.969238
-0.1474217539	0.3607887994	1923/1984	0.969254
-0.1474355713	0.3608015727	1861/1920	0.969271
-0.1474254032	0.3608344578	15881/16384	0.969299
-0.1474277381	0.3608325427	1737/1792	0.969308
-0.1473543002	0.3608581707	7941/8192	0.96936
-0.1473655254	0.3608748738	1489/1536	0.969401
-0.1472809091	0.3608952097	15883/16384	0.969421
-0.1472330466	0.3605738252	3971/4096	0.969482
-0.1471319787	0.3605313675	15885/16384	0.969543
-0.1473598334	0.360355194	7943/8192	0.969604
-0.1475280777	0.3603325273	15887/16384	0.969666
-0.1476469196	0.3601110821	993/1024	0.969727
-0.1476469196	0.3601110821	993/1024	0.969727
-0.1476516576	0.3601026419	1955/2016	0.969742
-0.147649391	0.3601468305	15889/16384	0.969788
-0.1475875215	0.3601420932	7945/8192	0.969849
-0.147545063	0.3601360949	15891/16384	0.96991
-0.1475154499	0.3600272225	3973/4096	0.969971
-0.1475181689	0.3600228223	1971/2032	0.96998
-0.1474874558	0.3600468283	15893/16384	0.970032
-0.147421335	0.3599134503	7947/8192	0.970093
-0.1474302668	0.3599097835	1979/2040	0.970098
-0.1475154963	0.3597223433	15895/16384	0.970154
-0.147519657	0.3597346735	1983/2044	0.970157
-0.1476881315	0.3597662275	1985/2046	0.970186
-0.1479502492	0.3596905974	1987/2048	0.970215
-0.1478970946	0.3597104641	1925/1984	0.970262
-0.147886301	0.3596535256	15897/16384	0.970276
-0.1478517046	0.3596136187	621/640	0.970313
-0.1479731878	0.3595045859	7949/8192	0.970337
-0.1481157516	0.3593514796	15899/16384	0.970398
-0.1483814283	0.3597952493	3975/4096	0.970459
-0.1484876581	0.3597665485	15901/16384	0.97052
-0.1485125379	0.3600685968	7951/8192	0.970581
-0.1484264006	0.3605972636	15903/16384	0.970642
-0.1489605075	0.3601243273	497/512	0.970703
-0.1489605075	0.3601243273	497/512	0.970703
-0.1489769093	0.3601251972	1957/2016	0.970734
-0.148967497	0.3601564739	15905/16384	0.970764
-0.1489049731	0.3601534686	7953/8192	0.970825
-0.1488643185	0.3601385985	15907/16384	0.970886
-0.1488705182	0.3600485581	3977/4096	0.970947
-0.1488746665	0.3600514534	1973/2032	0.970965
-0.148848805	0.3600531456	15909/16384	0.971008
-0.148853189	0.3599747388	7955/8192	0.971069
-0.1488541213	0.3599800039	1981/2040	0.971078
-0.1489035022	0.3599270609	15911/16384	0.97113
-0.1489000806	0.3599297487	1985/2044	0.971135
-0.1489540739	0.3599326392	1987/2046	0.971163
-0.1490119672	0.3598561515	1989/2048	0.971191
-0.1489887947	0.3598669062	15913/16384	0.971252
-0.1489881347	0.3598712212	1927/1984	0.97127
-0.148962484	0.3598243131	7957/8192	0.971313
-0.1489542974	0.3598339507	373/384	0.971354
-0.1489258012	0.3597878791	15915/16384	0.971375
-0.1491363	0.3596326454	3979/4096	0.971436
-0.1490996708	0.3595225793	15917/16384	0.971497
-0.1495014566	0.3596653038	7959/8192	0.971558
-0.14955142	0.3599796356	15919/16384	0.971619
-0.1498564214	0.3603440728	995/1024	0.97168
-0.1498564214	0.3603440728	995/1024	0.97168
-0.1498090195	0.3603682379	653/672	0.971726
-0.1497978274	0.3603151228	15921/16384	0.971741
-0.1498656812	0.3602147743	7961/8192	0.971802
-0.1499228878	0.3601425452	15923/16384	0.971863
-0.1501699326	0.3602433172	3981/4096	0.971924
-0.1501369983	0.3602483823	1975/2032	0.971949
-0.1501820032	0.3601592409	15925/16384	0.971985
-0.1501635406	0.3601548252	1493/1536	0.972005
-0.1505188755	0.3603594763	7963/8192	0.972046
-0.1504789842	0.3603092592	661/680	0.972059
-0.1504538734	0.3607672239	15927/16384	0.972107
-0.1504987759	0.3607440874	1987/2044	0.972114
-0.1502121631	0.360834229	663/682	0.972141
-0.1499922809	0.3611240789	1991/2048	0.972168
-0.150075663	0.3610967369	15929/16384	0.972229
-0.150150623	0.3611780766	1929/1984	0.972278
-0.1501239144	0.3612755462	7965/8192	0.97229
-0.1501451568	0.3614511229	15931/16384	0.972351
-0.1498730161	0.3615298413	1867/1920	0.972396
-0.1496292104	0.3615452947	3983/4096	0.972412
-0.1496710417	0.3616968878	15933/16384	0.972473
-0.1487861532	0.3617330199	7967/8192	0.972534
-0.1496239306	0.36338684	15935/16384	0.972595
-0.1499212784	0.3623874518	249/256	0.972656
-0.1499212784	0.3623874518	249/256	0.972656
-0.1499405399	0.3624165983	15937/16384	0.972717
-0.1499406241	0.3624171163	1961/2016	0.972718
-0.1498728272	0.3624377236	7969/8192	0.972778
-0.1498189401	0.3624344644	15939/16384	0.972839
-0.1498105638	0.3623204989	3985/4096	0.9729
-0.1498078698	0.3623319011	1977/2032	0.972933
-0.1497833537	0.3623275137	15941/16384	0.972961
-0.1497974746	0.36223242	7971/8192	0.973022
-0.1497862182	0.3622361279	397/408	0.973039
-0.1498596321	0.3621952198	15943/16384	0.973083
-0.1498544905	0.3621896496	1989/2044	0.973092
-0.1499055473	0.3622055023	181/186	0.973118
-0.1499643249	0.3621580733	1993/2048	0.973145
-0.1499449476	0.3621626084	15945/16384	0.973206
-0.1499350552	0.3621244973	7973/8192	0.973267
-0.1499347075	0.3621292355	1931/1984	0.973286
-0.1499264069	0.3621297163	1495/1536	0.973307
-0.1499205617	0.3620872707	15947/16384	0.973328
-0.1500757662	0.3620621404	3987/4096	0.973389
-0.1500504152	0.362038317	623/640	0.973437
-0.1500865859	0.3620117355	15949/16384	0.97345
-0.1501992898	0.3621060026	7975/8192	0.973511
-0.1502349212	0.3622029486	15951/16384	0.973572
-0.150421615	0.3622251795	997/1024	0.973633
-0.150421615	0.3622251795	997/1024	0.973633
-0.1503987208	0.3622419399	15953/16384	0.973694
-0.1503977312	0.3622476719	1963/2016	0.97371
-0.1503793219	0.3621973077	7977/8192	0.973755
-0.1503789687	0.3622013816	1745/1792	0.973772
-0.150369784	0.3621677317	15955/16384	0.973816
-0.1504269176	0.3621119562	3989/4096	0.973877
-0.1504189513	0.3621205522	1979/2032	0.973917
-0.1504050758	0.3621034473	15957/16384	0.973938
-0.1504545175	0.3620180345	7979/8192	0.973999
-0.150437784	0.3620242628	1987/2040	0.97402
-0.1505905258	0.361983918	15959/16384	0.97406
-0.1505766067	0.3619627782	1991/2044	0.97407
-0.1506702907	0.3620855586	1993/2046	0.974096
-0.1508991266	0.3622304245	1995/2048	0.974121
-0.1508673929	0.3621548042	15961/16384	0.974182
-0.151042005	0.362068721	7981/8192	0.974243
-0.1509691908	0.3619781633	1933/1984	0.974294
-0.1512813521	0.3619585938	15963/16384	0.974304
-0.1511643672	0.3628369251	3991/4096	0.974365
-0.1513350459	0.3630184679	15965/16384	0.974426
-0.1509652632	0.3632717562	1871/1920	0.974479
-0.1507124176	0.3631866182	7983/8192	0.974487
-0.1501464203	0.3629495966	15967/16384	0.974548
-0.1503910642	0.3640972993	499/512	0.974609
-0.1503910642	0.3640972993	499/512	0.974609
-0.1503122866	0.3640929173	15969/16384	0.97467
-0.1502812369	0.364045606	655/672	0.974702
-0.1503659616	0.3639562118	7985/8192	0.974731
-0.1504269752	0.3638803992	15971/16384	0.974792
-0.1506216643	0.3639608701	3993/4096	0.974854
-0.1506005785	0.3639501577	1747/1792	0.974888
-0.1505942347	0.3639349085	1981/2032	0.974902
-0.150625297	0.363906912	15973/16384	0.974915
-0.1508039468	0.3639789819	7987/8192	0.974976
-0.1508014812	0.3639327537	39/40	0.975
-0.1508688207	0.3641402916	15975/16384	0.975037
-0.1509045084	0.36412577	1993/2044	0.975049
-0.1508217225	0.3642655467	665/682	0.975073
-0.150905011	0.3645021608	1997/2048	0.975098
-0.150907883	0.3644258754	15977/16384	0.975159
-0.1510584643	0.3644212044	7989/8192	0.97522
-0.1512140608	0.3643782091	15979/16384	0.975281
-0.1512044393	0.3642892389	1935/1984	0.975302
-0.1511028245	0.3651867367	3995/4096	0.975342
-0.1513759127	0.3654141518	15981/16384	0.975403
-0.1503936181	0.36554042	7991/8192	0.975464
-0.1499777132	0.3654039264	1873/1920	0.975521
-0.1500147474	0.3651702912	15983/16384	0.975525
-0.1492300344	0.3651461447	999/1024	0.975586
-0.1492300344	0.3651461447	999/1024	0.975586
-0.1493227239	0.3650848384	15985/16384	0.975647
-0.1494058301	0.3651631601	281/288	0.975694
-0.1493884425	0.3652672806	7993/8192	0.975708
-0.1494173034	0.3653960783	15987/16384	0.975769
-0.1491139089	0.3655657522	3997/4096	0.97583
-0.1491964035	0.3655920715	1983/2032	0.975886
-0.1491904323	0.3656392122	15989/16384	0.975891
-0.1492094311	0.3656233946	1499/1536	0.975911
-0.1488211081	0.3658073187	7995/8192	0.975952
-0.1488490071	0.3659447896	1991/2040	0.97598
-0.1484845043	0.3656223622	15991/16384	0.976013
-0.1483894878	0.3656543282	285/292	0.976027
-0.1484306084	0.3653036712	1997/2046	0.976051
-0.1481068296	0.3649487021	1999/2048	0.976074
-0.1481450738	0.3650983262	15993/16384	0.976135
-0.1478582802	0.365180514	7997/8192	0.976196
-0.1475927124	0.3652859647	15995/16384	0.976257
-0.1475171832	0.3646388544	1937/1984	0.97631
-0.1470796369	0.363902975	3999/4096	0.976318
-0.1462068964	0.3645622422	15997/16384	0.976379
-0.1441714125	0.3661369382	7999/8192	0.97644
-0.1467193579	0.3676759095	15999/16384	0.976501
-0.1465982514	0.3664796788	125/128	0.976562
-0.1465982514	0.3664796788	125/128	0.976562
-0.1466485528	0.3665266406	16001/16384	0.976624
-0.1465359077	0.366593795	8001/8192	0.976685
-0.1465333351	0.3665954575	1969/2016	0.976687
-0.1464389388	0.3666164493	16003/16384	0.976746
-0.1463729491	0.3664067824	4001/4096	0.976807
-0.1463196353	0.3664324144	16005/16384	0.976868
-0.1463179497	0.3664298642	1985/2032	0.97687
-0.1463187276	0.3662408935	8003/8192	0.976929
-0.1462773072	0.3661909692	1993/2040	0.976961
-0.1464301819	0.3661572207	16007/16384	0.97699
-0.1464462336	0.3661273123	1997/2044	0.977006
-0.1465333373	0.3661694732	1999/2046	0.977028
-0.1466314035	0.3660959882	2001/2048	0.977051
-0.1465918971	0.3661013824	16009/16384	0.977112
-0.1465938883	0.3661044653	1751/1792	0.977121
-0.1465818288	0.3660272848	8005/8192	0.977173
-0.1465630081	0.3660358978	1501/1536	0.977214
-0.1465630975	0.3659534749	16011/16384	0.977234
-0.1468360247	0.3659686776	4003/4096	0.977295
-0.1468048484	0.3659692714	1939/1984	0.977319
-0.1468778665	0.3658939965	16013/16384	0.977356
-0.146988916	0.3660712903	8007/8192	0.977417
-0.1470026709	0.3661918054	16015/16384	0.977478
-0.1471955435	0.3662817495	1001/1024	0.977539
-0.1471955435	0.3662817495	1001/1024	0.977539
-0.1471623851	0.3662933034	16017/16384	0.9776
-0.1471644393	0.3662928286	1877/1920	0.977604
-0.1471586256	0.3662373062	8009/8192	0.977661
-0.1471563688	0.3662420677	219/224	0.977679
-0.1471592714	0.3662031618	16019/16384	0.977722
-0.1472393865	0.366170465	4005/4096	0.977783
-0.1472205588	0.3661517713	16021/16384	0.977844
-0.1472206773	0.3661548448	1987/2032	0.977854
-0.1473068724	0.3660957084	8011/8192	0.977905
-0.1472981126	0.3660556088	133/136	0.977941
-0.1474316104	0.3661308396	16023/16384	0.977966
-0.1474755172	0.366119841	1999/2044	0.977984
-0.1474546555	0.3662571174	667/682	0.978006
-0.1475356913	0.366405306	2003/2048	0.978027
-0.1475406436	0.3663487098	16025/16384	0.978088
-0.1476589541	0.3663650971	8013/8192	0.978149
-0.1477859548	0.3664014056	16027/16384	0.97821
-0.1475991976	0.3667077404	4007/4096	0.978271
-0.147674016	0.3667239404	1941/1984	0.978327
-0.1476640002	0.3667697578	16029/16384	0.978333
-0.1474512831	0.36688975	8015/8192	0.978394
-0.1471721277	0.366924936	16031/16384	0.978455
-0.1476237686	0.3673575609	501/512	0.978516
-0.1476237686	0.3673575609	501/512	0.978516
-0.1475936717	0.3674056352	16033/16384	0.978577
-0.1475371517	0.3673220617	8017/8192	0.978638
-0.1475422674	0.3673248028	1879/1920	0.978646
-0.1475179228	0.3673277073	1973/2016	0.978671
-0.1475249848	0.3672629538	16035/16384	0.978699
-0.1476272758	0.3672102644	4009/4096	0.97876
-0.1476067739	0.3671910961	16037/16384	0.978821
-0.1476016968	0.3671938456	1989/2032	0.978839
-0.1476824578	0.3671492508	8019/8192	0.978882
-0.1476779435	0.3671178375	1997/2040	0.978922
-0.1477497092	0.3671610918	16039/16384	0.978943
-0.1477668835	0.367147918	2001/2044	0.978963
-0.1477932744	0.3672043537	2003/2046	0.978983
-0.1478843693	0.3672036845	2005/2048	0.979004
-0.1478547889	0.3671930087	16041/16384	0.979065
-0.1478716047	0.3671407785	8021/8192	0.979126
-0.147874592	0.3670898628	16043/16384	0.979187
-0.1481168509	0.3671334864	4011/4096	0.979248
-0.148155251	0.367031933	16045/16384	0.979309
-0.1481057614	0.3670017294	1943/1984	0.979335
-0.1483633532	0.3673476332	8023/8192	0.97937
-0.1482376571	0.3676235998	16047/16384	0.979431
-0.1482820314	0.3683370556	1003/1024	0.979492
-0.1482820314	0.3683370556	1003/1024	0.979492
-0.1481983198	0.368225573	16049/16384	0.979553
-0.1484003016	0.3681355792	8025/8192	0.979614
-0.1483721782	0.3680613017	1975/2016	0.979663
-0.1485296322	0.3680759902	16051/16384	0.979675
-0.1485079672	0.368044925	627/640	0.979688
-0.1488441465	0.3683758575	4013/4096	0.979736
-0.148898855	0.3682337031	16053/16384	0.979797
-0.1488673244	0.3682189471	1505/1536	0.979818
-0.1488450973	0.3681967939	1991/2032	0.979823
-0.1494195487	0.3686674001	8027/8192	0.979858
-0.1496868514	0.3683053677	1999/2040	0.979902
-0.1492203257	0.3695340081	16055/16384	0.979919
-0.1495280069	0.3701589787	2003/2044	0.979941
-0.1483737884	0.3696587355	2005/2046	0.979961
-0.1475020697	0.3697415969	2007/2048	0.97998
-0.1477777651	0.3698753317	16057/16384	0.980042
-0.1473943468	0.3704100483	8029/8192	0.980103
-0.1468534288	0.3708047308	16059/16384	0.980164
-0.1462032936	0.3693834313	4015/4096	0.980225
-0.1458356356	0.3695215716	16061/16384	0.980286
-0.1457584452	0.3689132346	1945/1984	0.980343
-0.1458299956	0.3683178806	8031/8192	0.980347
-0.1425527112	0.3674070094	16063/16384	0.980408
-0.143548516	0.3696703218	251/256	0.980469
-0.143548516	0.3696703218	251/256	0.980469
-0.1433374463	0.3696943088	16065/16384	0.98053
-0.1434444409	0.3693433708	8033/8192	0.980591
-0.1435868995	0.3691613407	16067/16384	0.980652
-0.1435850747	0.3691849958	659/672	0.980655
-0.1439786279	0.3693813489	4017/4096	0.980713
-0.1439462571	0.3693955331	1883/1920	0.980729
-0.1440098948	0.3692710168	16069/16384	0.980774
-0.1440591002	0.3692076819	1993/2032	0.980807
-0.14426991	0.3694742722	8035/8192	0.980835
-0.1444656381	0.3694733072	667/680	0.980882
-0.1443048743	0.3697018688	16071/16384	0.980896
-0.1443580385	0.3697955018	2005/2044	0.98092
-0.1442077211	0.3698927353	669/682	0.980938
-0.1442687513	0.3701095516	2009/2048	0.980957
-0.144283704	0.3700204774	16073/16384	0.981018
-0.1444321221	0.3700467934	8037/8192	0.981079
-0.1444246828	0.3700052893	1507/1536	0.98112
-0.1445717312	0.370042904	16075/16384	0.98114
-0.144468334	0.3705827898	4019/4096	0.981201
-0.1446495214	0.3706789482	16077/16384	0.981262
-0.1441974419	0.3709503791	8039/8192	0.981323
-0.1442560872	0.3710650627	1947/1984	0.981351
-0.1438649404	0.3709377104	16079/16384	0.981384
-0.1432932239	0.3715006089	1005/1024	0.981445
-0.1432932239	0.3715006089	1005/1024	0.981445
-0.1433021581	0.3713120859	16081/16384	0.981506
-0.1435420619	0.3713997336	8041/8192	0.981567
-0.1435231754	0.371380937	1759/1792	0.981585
-0.1436739729	0.3714403375	16083/16384	0.981628
-0.1437137159	0.3714128829	1979/2016	0.981647
-0.143736216	0.3718055251	4021/4096	0.981689
-0.1438360427	0.3717287891	16085/16384	0.98175
-0.14382159	0.3717035481	377/384	0.981771
-0.1439171236	0.3716454062	1995/2032	0.981791
-0.1440503345	0.3721353169	8043/8192	0.981812
-0.144583304	0.3719862251	2003/2040	0.981863
-0.1438771896	0.3727524994	16087/16384	0.981873
-0.1436357393	0.3736543323	2007/2044	0.981898
-0.1429390812	0.372820372	2009/2046	0.981916
-0.1420661117	0.3728319745	2011/2048	0.981934
-0.1424364105	0.3730605054	16089/16384	0.981995
-0.1419174433	0.3737709461	8045/8192	0.982056
-0.141207495	0.3744929849	16091/16384	0.982117
-0.140348076	0.3720355874	4023/4096	0.982178
-0.1396760692	0.3719364022	16093/16384	0.982239
-0.1404302428	0.3707652309	8047/8192	0.9823
-0.1406918199	0.3702201976	1949/1984	0.982359
-0.1411374502	0.3701298726	16095/16384	0.982361
-0.1396313527	0.3687043131	503/512	0.982422
-0.1396313527	0.3687043131	503/512	0.982422
-0.1398800815	0.368556161	16097/16384	0.982483
-0.1399607578	0.3689836685	8049/8192	0.982544
-0.1399522448	0.3692313811	16099/16384	0.982605
-0.1398093831	0.3693265358	283/288	0.982639
-0.139473181	0.3693552406	4025/4096	0.982666
-0.1395445422	0.3693497524	1761/1792	0.982701
-0.1395493117	0.3694718833	16101/16384	0.982727
-0.1395176723	0.3697013827	1997/2032	0.982776
-0.1391720019	0.3695998071	8051/8192	0.982788
-0.1392468637	0.3696894856	629/640	0.982812
-0.1388207331	0.3697909517	401/408	0.982843
-0.1388557827	0.3694940999	16103/16384	0.982849
-0.1386610238	0.3693755358	287/292	0.982877
-0.1386999887	0.3691287335	2011/2046	0.982893
-0.138353794	0.3690044399	2013/2048	0.98291
-0.1384458564	0.3691552718	16105/16384	0.982971
-0.1382236385	0.3693295905	8053/8192	0.983032
-0.1380640444	0.3695717576	16107/16384	0.983093
-0.1373572563	0.3686056678	4027/4096	0.983154
-0.1368599905	0.3686610664	16109/16384	0.983215
-0.1373148305	0.3675832821	8055/8192	0.983276
-0.137897327	0.3672063883	16111/16384	0.983337
-0.1382535372	0.3671137695	1951/1984	0.983367
-0.1384462423	0.3660479982	1007/1024	0.983398
-0.1384462423	0.3660479982	1007/1024	0.983398
-0.1384586752	0.366321372	16113/16384	0.983459
-0.1380957522	0.366281699	8057/8192	0.983521
-0.1378708188	0.3662792102	16115/16384	0.983582
-0.1377692295	0.3659681612	661/672	0.983631
-0.137666627	0.3657480751	4029/4096	0.983643
-0.1375183437	0.365866691	16117/16384	0.983704
-0.1375383266	0.3659067909	1511/1536	0.983724
-0.1371894615	0.3655956682	1999/2032	0.98376
-0.1372028695	0.3653344369	8059/8192	0.983765
-0.1370843135	0.3647949681	669/680	0.983824
-0.137267364	0.3646775505	16119/16384	0.983826
-0.1375580535	0.3642684602	1889/1920	0.983854
-0.1375800974	0.3643896756	2011/2044	0.983855
-0.1380943693	0.3643884847	61/62	0.983871
-0.1384456983	0.3633167091	2015/2048	0.983887
-0.1380019681	0.3635471664	16121/16384	0.983948
-0.1374318324	0.3629971434	8061/8192	0.984009
-0.136752686	0.3627671251	16123/16384	0.98407
-0.1354807443	0.3602130741	4031/4096	0.984131
-0.1349372277	0.3610989438	16125/16384	0.984192
-0.1324092479	0.3613017439	8063/8192	0.984253
-0.1319341322	0.364290652	16127/16384	0.984314
-0.1340720792	0.3635696914	63/64	0.984375
-0.1340720792	0.3635696914	63/64	0.984375
-0.1339908386	0.3637149499	16129/16384	0.984436
-0.1337954932	0.3635527375	8065/8192	0.984497
-0.1336814452	0.3634170736	16131/16384	0.984558
-0.1339115761	0.3631602357	4033/4096	0.984619
-0.1339240817	0.3631586332	1985/2016	0.984623
-0.1338345112	0.3631029394	16133/16384	0.98468
-0.1340338195	0.3629238179	8067/8192	0.984741
-0.1340411249	0.3629387465	2001/2032	0.984744
-0.1342436522	0.3629235273	16135/16384	0.984802
-0.1342349278	0.3629299247	2009/2040	0.984804
-0.134319452	0.3630167939	2013/2044	0.984834
-0.1343526326	0.3631036199	65/66	0.984848
-0.1345142812	0.3630672671	2017/2048	0.984863
-0.134474902	0.3630714034	1891/1920	0.984896
-0.1344707914	0.3630173222	16137/16384	0.984924
-0.13446703	0.3630217377	1765/1792	0.984933
-0.1345360756	0.3629330361	8069/8192	0.984985
-0.1345067358	0.3629180467	1513/1536	0.985026
-0.1345802426	0.3628302553	16139/16384	0.985046
-0.1348908201	0.3630628785	4035/4096	0.985107
-0.1350181538	0.3630065552	16141/16384	0.985168
-0.1350347263	0.3633164127	8071/8192	0.985229
-0.1349804438	0.3634823494	16143/16384	0.985291
-0.1350702813	0.3637488259	1009/1024	0.985352
-0.1350702813	0.3637488259	1009/1024	0.985352
-0.1350319317	0.3637562124	1955/1984	0.985383
-0.135031893	0.3637027359	16145/16384	0.985413
-0.1350930317	0.3636569819	8073/8192	0.985474
-0.1351274966	0.3636218693	16147/16384	0.985535
-0.1352430426	0.3636669353	4037/4096	0.985596
-0.1352279098	0.3636696447	1987/2016	0.985615
-0.1352460931	0.3636243867	16149/16384	0.985657
-0.1353937911	0.3636385596	8075/8192	0.985718
-0.1353707391	0.3636320583	2003/2032	0.985728
-0.1355299878	0.3637864474	16151/16384	0.985779
-0.1355339016	0.3637547006	2011/2040	0.985784
-0.1354747555	0.3639223592	2015/2044	0.985812
-0.1353702329	0.3639741085	2017/2046	0.985826
-0.1353825109	0.3641702529	2019/2048	0.98584
-0.1354580971	0.3641256599	16153/16384	0.985901
-0.1355092591	0.3641092622	631/640	0.985938
-0.1355518126	0.3642556885	8077/8192	0.985962
-0.1356479807	0.3644068445	16155/16384	0.986023
-0.1352397222	0.36454773	4039/4096	0.986084
-0.1352474099	0.3646574447	16157/16384	0.986145
-0.1350079928	0.3646470772	8079/8192	0.986206
-0.1348046998	0.3646485848	16159/16384	0.986267
-0.134795268	0.3650377297	505/512	0.986328
-0.134795268	0.3650377297	505/512	0.986328
-0.134734385	0.3649986593	16161/16384	0.986389
-0.1347377475	0.3649996415	1957/1984	0.986391
-0.1348045203	0.3649365624	8081/8192	0.98645
-0.1348449094	0.3649062642	16163/16384	0.986511
-0.1349268251	0.3649574321	4041/4096	0.986572
-0.1349178674	0.3649468892	221/224	0.986607
-0.1349337856	0.3649310874	16165/16384	0.986633
-0.1350036652	0.3649573302	8083/8192	0.986694
-0.1350019663	0.3649439329	2005/2032	0.986713
-0.1350443626	0.3650079913	16167/16384	0.986755
-0.1350524089	0.3650014527	671/680	0.986765
-0.135045071	0.365052507	2017/2044	0.986791
-0.135022873	0.3650868791	673/682	0.986804
-0.1350829214	0.36513304	2021/2048	0.986816
-0.1350824743	0.365099475	16169/16384	0.986877
-0.1351314082	0.3650872654	8085/8192	0.986938
-0.1351236689	0.3650740415	379/384	0.986979
-0.1351716865	0.3650576316	16171/16384	0.987
-0.1352806047	0.365253659	4043/4096	0.987061
-0.1353899654	0.365230538	16173/16384	0.987122
-0.1352976945	0.3655499591	8087/8192	0.987183
-0.1350800126	0.3656512059	16175/16384	0.987244
-0.1347241935	0.3658950346	1011/1024	0.987305
-0.1347241935	0.3658950346	1011/1024	0.987305
-0.1347906082	0.3658223484	16177/16384	0.987366
-0.1348345178	0.3658145844	1959/1984	0.987399
-0.1348796856	0.3659108626	8089/8192	0.987427
-0.1349510907	0.3659591268	16179/16384	0.987488
-0.1348800018	0.3661883439	4045/4096	0.987549
-0.1349369607	0.3661451692	1991/2016	0.987599
-0.1349705677	0.3661951308	16181/16384	0.98761
-0.1349763524	0.3661737899	1517/1536	0.98763
-0.1348797063	0.3665019323	8091/8192	0.987671
-0.1350284316	0.3665207014	2007/2032	0.987697
-0.1345523953	0.3666185388	16183/16384	0.987732
-0.1345034751	0.3667329046	403/408	0.987745
-0.134354721	0.3664701241	2019/2044	0.987769
-0.1343448106	0.366311765	2021/2046	0.987781
-0.1341096493	0.3662835247	2023/2048	0.987793
-0.1341538693	0.3663886851	16185/16384	0.987854
-0.1339894902	0.3664690434	8093/8192	0.987915
-0.1338383602	0.3665478853	16187/16384	0.987976
-0.1336625284	0.3663532966	1897/1920	0.988021
-0.1336375693	0.3661502117	4047/4096	0.988037
-0.1335100486	0.3662115864	16189/16384	0.988098
-0.1333511981	0.365882139	8095/8192	0.988159
-0.1330909793	0.3653198815	16191/16384	0.98822
-0.1326873426	0.3664305801	253/256	0.988281
-0.1326873426	0.3664305801	253/256	0.988281
-0.1325486169	0.3663895012	16193/16384	0.988342
-0.1326676869	0.3662333228	8097/8192	0.988403
-0.1326699548	0.3662439672	1961/1984	0.988407
-0.1327515741	0.3661662257	16195/16384	0.988464
-0.1328939785	0.36627733	4049/4096	0.988525
-0.132913989	0.3662347693	16197/16384	0.988586
-0.1329107781	0.366237779	1993/2016	0.988591
-0.1330080475	0.3663001475	8099/8192	0.988647
-0.133042746	0.3662866778	2009/2032	0.988681
-0.1330425483	0.3663765486	16199/16384	0.988708
-0.1330609258	0.366388915	2017/2040	0.988725
-0.1330314392	0.3664371593	2021/2044	0.988748
-0.1330006232	0.3664674217	2023/2046	0.988759
-0.1330530037	0.3665175825	2025/2048	0.98877
-0.1330594651	0.3664835082	16201/16384	0.988831
-0.1331087953	0.3664844549	8101/8192	0.988892
-0.1331053771	0.366469423	1519/1536	0.988932
-0.1331534472	0.3664704839	16203/16384	0.988953
-0.1331826377	0.3666357661	4051/4096	0.989014
-0.1332199385	0.3666020232	633/640	0.989062
-0.1332483894	0.366645163	16205/16384	0.989075
-0.1331789697	0.3667819489	8103/8192	0.989136
-0.1331032699	0.3668499589	16207/16384	0.989197
-0.1330498026	0.3670686257	1013/1024	0.989258
-0.1330498026	0.3670686257	1013/1024	0.989258
-0.1330393687	0.367007526	16209/16384	0.989319
-0.1331065063	0.367002177	8105/8192	0.98938
-0.1330998572	0.3669978118	1773/1792	0.989397
-0.133104177	0.3669882052	1963/1984	0.989415
-0.1331434827	0.3669891711	16211/16384	0.989441
-0.1332154967	0.3670573967	4053/4096	0.989502
-0.1332283718	0.3670241033	16213/16384	0.989563
-0.1332216241	0.3670194105	95/96	0.989583
-0.1333335744	0.3670615257	8107/8192	0.989624
-0.1333618876	0.3670072477	2011/2032	0.989665
-0.1334326312	0.3671789598	16215/16384	0.989685
-0.1335146385	0.3671946383	673/680	0.989706
-0.1333885953	0.3673504909	289/292	0.989726
-0.1332677955	0.3673747673	675/682	0.989736
-0.133253691	0.367591046	2027/2048	0.989746
-0.1333667703	0.3675277338	16217/16384	0.989807
-0.1335162011	0.3676990762	8109/8192	0.989868
-0.1337449809	0.3678789251	16219/16384	0.989929
-0.1328697621	0.36823024	4055/4096	0.98999
-0.1327682512	0.3685556008	16221/16384	0.990051
-0.1322467691	0.3683956334	1901/1920	0.990104
-0.1322598685	0.368115308	8111/8192	0.990112
-0.1320297709	0.3677718405	16223/16384	0.990173
-0.13107071	0.3678788037	507/512	0.990234
-0.13107071	0.3678788037	507/512	0.990234
-0.1312199633	0.3676784047	16225/16384	0.990295
-0.1313880538	0.3678938891	8113/8192	0.990356
-0.1314825312	0.3679960494	16227/16384	0.990417
-0.1314885025	0.3679728773	1965/1984	0.990423
-0.1313644797	0.3682556183	4057/4096	0.990479
-0.1313983722	0.3682186853	1775/1792	0.990513
-0.13145528	0.3682636777	16229/16384	0.99054
-0.1315168791	0.36826359	1997/2016	0.990575
-0.1314145349	0.3684973645	8115/8192	0.990601
-0.1315717958	0.3686459859	2013/2032	0.99065
-0.1312760042	0.368668538	16231/16384	0.990662
-0.1312174731	0.3688049759	2021/2040	0.990686
-0.1310474239	0.3687161112	2025/2044	0.990705
-0.1309444407	0.3686236309	2027/2046	0.990714
-0.1307949436	0.3688111946	2029/2048	0.990723
-0.1309427563	0.3688243725	16233/16384	0.990784
-0.1309760117	0.3690292775	8117/8192	0.990845
-0.1311023204	0.369208432	16235/16384	0.990906
-0.130188951	0.3694491976	4059/4096	0.990967
-0.130059998	0.3699224918	16237/16384	0.991028
-0.1292880557	0.3691378804	8119/8192	0.991089
-0.1289834052	0.3685538186	1903/1920	0.991146
-0.1292390014	0.3685096892	16239/16384	0.99115
-0.1290716574	0.3674776341	1015/1024	0.991211
-0.1290716574	0.3674776341	1015/1024	0.991211
-0.1291586075	0.3677293518	16241/16384	0.991272
-0.1288817972	0.3678144462	8121/8192	0.991333
-0.1287177336	0.367915718	16243/16384	0.991394
-0.1285125681	0.3678870642	1967/1984	0.991431
-0.1283638844	0.3675742298	4061/4096	0.991455
-0.128257082	0.3677332246	16245/16384	0.991516
-0.1282892666	0.367770556	1523/1536	0.991536
-0.1277479083	0.3679321158	1999/2016	0.991567
-0.1278624669	0.3673654119	8123/8192	0.991577
-0.1275485429	0.3668119117	2015/2032	0.991634
-0.1278147908	0.366852524	16247/16384	0.991638
-0.127981164	0.3665688996	119/120	0.991667
-0.1282278525	0.3665609076	2027/2044	0.991683
-0.128428059	0.3665835319	2029/2046	0.991691
-0.1284280242	0.3662114435	2031/2048	0.991699
-0.1282173263	0.3662762986	16249/16384	0.99176
-0.1280758784	0.3660121477	8125/8192	0.991821
-0.1278943618	0.3658054993	16251/16384	0.991882
-0.1284601555	0.3652102617	4063/4096	0.991943
-0.128208432	0.3649904342	16253/16384	0.992004
-0.1286731478	0.3640972674	8127/8192	0.992065
-0.1274505604	0.3624175127	16255/16384	0.992126
-0.126610166	0.364299067	127/128	0.992188
-0.126610166	0.364299067	127/128	0.992188
-0.1264691729	0.36403339	16257/16384	0.992249
-0.1268033158	0.3639441746	8129/8192	0.99231
-0.1269998221	0.3639084388	16259/16384	0.992371
-0.1271313215	0.3642208321	4065/4096	0.992432
-0.127107402	0.3642150939	1969/1984	0.99244
-0.1272140373	0.3641730931	16261/16384	0.992493
-0.1273084326	0.364370848	8131/8192	0.992554
-0.1273001106	0.364346239	667/672	0.99256
-0.1272939129	0.364534957	16263/16384	0.992615
-0.12730727	0.3645248423	2017/2032	0.992618
-0.1272316947	0.3645961244	135/136	0.992647
-0.1271708409	0.364618517	2029/2044	0.992661
-0.127111322	0.3646317065	677/682	0.992669
-0.1271572161	0.3647403575	2033/2048	0.992676
-0.1272093985	0.3647064077	16265/16384	0.992737
-0.1272065272	0.3647015539	1779/1792	0.992746
-0.1272710207	0.3647605454	8133/8192	0.992798
-0.1272860363	0.3647370005	1525/1536	0.992839
-0.1273468906	0.3647898862	16267/16384	0.992859
-0.1272181157	0.3650193624	4067/4096	0.99292
-0.1272814998	0.3651019849	16269/16384	0.992981
-0.1270898162	0.3651874085	8135/8192	0.993042
-0.1269631592	0.3652077594	16271/16384	0.993103
-0.1267627769	0.3653392579	1017/1024	0.993164
-0.1267627769	0.3653392579	1017/1024	0.993164
-0.1268118639	0.3652915955	16273/16384	0.993225
-0.1268080289	0.3652901051	1907/1920	0.993229
-0.1268607148	0.365335688	8137/8192	0.993286
-0.1268993582	0.3653516408	16275/16384	0.993347
-0.1269020493	0.3654539225	4069/4096	0.993408
-0.1269123401	0.3654330356	1971/1984	0.993448
-0.126939529	0.3654416823	16277/16384	0.993469
-0.1269856246	0.3655446776	8139/8192	0.99353
-0.1270085231	0.3655182912	2003/2016	0.993552
-0.1269702089	0.3656975957	16279/16384	0.993591
-0.1270154777	0.3657182332	2019/2032	0.993602
-0.1268538352	0.3657662169	2027/2040	0.993627
-0.1267747586	0.3657274495	2031/2044	0.99364
-0.1267207472	0.3656817479	2033/2046	0.993646
-0.1266365242	0.365795347	2035/2048	0.993652
-0.1267209004	0.3658389142	16281/16384	0.993713
-0.1266850559	0.3659785029	8141/8192	0.993774
-0.1266629365	0.3661420535	16283/16384	0.993835
-0.1262849914	0.3659809531	4071/4096	0.993896
-0.1261979857	0.3660747082	16285/16384	0.993958
-0.1260367307	0.3658984662	8143/8192	0.994019
-0.1259099636	0.3657709127	16287/16384	0.99408
-0.1254953321	0.3658880898	509/512	0.994141
-0.1254953321	0.3658880898	509/512	0.994141
-0.1255828131	0.3657809588	16289/16384	0.994202
-0.1256618085	0.3658698634	8145/8192	0.994263
-0.1256570623	0.3658609492	1909/1920	0.994271
-0.1257118885	0.3659035468	16291/16384	0.994324
-0.1256945197	0.3660183908	4073/4096	0.994385
-0.1257323159	0.3660124151	16293/16384	0.994446
-0.1257305905	0.3660077193	1973/1984	0.994456
-0.1257510719	0.366097889	8147/8192	0.994507
-0.1257898174	0.3661051954	2005/2016	0.994544
-0.1257395862	0.3661780741	16295/16384	0.994568
-0.1257513893	0.366204668	2021/2032	0.994587
-0.1256933587	0.3662287427	2029/2040	0.994608
-0.1256520064	0.3662307685	2033/2044	0.994618
-0.1256104601	0.3662273514	185/186	0.994624
-0.125628041	0.3663119121	2037/2048	0.994629
-0.1256771952	0.3662879344	16297/16384	0.99469
-0.1257261198	0.3663327919	8149/8192	0.994751
-0.125790847	0.3663469255	16299/16384	0.994812
-0.1257061173	0.3666146364	4075/4096	0.994873
-0.1258437476	0.3667037849	16301/16384	0.994934
-0.1254910224	0.3669673881	8151/8192	0.994995
-0.1251470169	0.3669213058	16303/16384	0.995056
-0.1245318482	0.3666738073	1019/1024	0.995117
-0.1245318482	0.3666738073	1019/1024	0.995117
-0.1247125238	0.3667595085	16305/16384	0.995178
-0.1246566765	0.3669427889	8153/8192	0.995239
-0.1246707493	0.3670810718	16307/16384	0.9953
-0.1247174142	0.3670870157	637/640	0.995313
-0.1243144292	0.3672138862	4077/4096	0.995361
-0.1243992365	0.3673606877	16309/16384	0.995422
-0.1244414376	0.3673496777	1529/1536	0.995443
-0.1245459184	0.3674518801	1975/1984	0.995464
-0.1239672614	0.3675757181	8155/8192	0.995483
-0.1234288399	0.3674293014	16311/16384	0.995544
-0.1230993609	0.367068402	2023/2032	0.995571
-0.1233371425	0.366865101	677/680	0.995588
-0.1234746882	0.3667599632	2035/2044	0.995597
-0.1236008377	0.3666623962	679/682	0.995601
-0.123353321	0.3664743412	2039/2048	0.995605
-0.1231972735	0.3666631467	16313/16384	0.995667
-0.1229150212	0.3665066582	8157/8192	0.995728
-0.1226213793	0.3663835091	16315/16384	0.995789
-0.1229515552	0.365750847	4079/4096	0.99585
-0.1227567748	0.3656169042	16317/16384	0.995911
-0.1229636184	0.3652272114	8159/8192	0.995972
-0.1230738189	0.3648059454	16319/16384	0.996033
-0.1221059398	0.364426339	255/256	0.996094
-0.1221059398	0.364426339	255/256	0.996094
-0.1224046868	0.3643038126	16321/16384	0.996155
-0.1224632093	0.3645618081	8161/8192	0.996216
-0.1225151569	0.3646834849	16323/16384	0.996277
-0.1223580997	0.3648416648	4081/4096	0.996338
-0.1223778354	0.3648221184	1913/1920	0.996354
-0.1224181939	0.3648786199	16325/16384	0.996399
-0.1223538616	0.3650077085	8163/8192	0.99646
-0.1223823651	0.3650042883	1977/1984	0.996472
-0.1222657098	0.3650926899	16327/16384	0.996521
-0.1222767308	0.3651104505	287/288	0.996528
-0.1221907562	0.365105961	2025/2032	0.996555
-0.1221456777	0.3650846755	2033/2040	0.996569
-0.1221129146	0.3650628606	291/292	0.996575
-0.1220759474	0.3650361649	2039/2046	0.996579
-0.1220553911	0.3651327754	2041/2048	0.996582
-0.1221172402	0.3651516183	16329/16384	0.996643
-0.1221248643	0.3652243716	8165/8192	0.996704
-0.1221514151	0.365217689	1531/1536	0.996745
-0.1221652532	0.3652853794	16331/16384	0.996765
-0.1219479468	0.365400504	4083/4096	0.996826
-0.1219615937	0.3655184307	16333/16384	0.996887
-0.1217285111	0.3655051534	8167/8192	0.996948
-0.1215792088	0.3654517206	16335/16384	0.997009
-0.1212578578	0.3653782875	1021/1024	0.99707
-0.1212578578	0.3653782875	1021/1024	0.99707
-0.1213674364	0.3654053978	16337/16384	0.997131
-0.1213672924	0.3654943622	8169/8192	0.997192
-0.1213789868	0.3654861513	1787/1792	0.99721
-0.1213954323	0.3655473866	16339/16384	0.997253
-0.1213035336	0.3656647222	4085/4096	0.997314
-0.1213637705	0.3656897192	16341/16384	0.997375
-0.1213739136	0.3656780998	383/384	0.997396
-0.121337721	0.365854992	8171/8192	0.997437
-0.1214643485	0.365890294	1979/1984	0.99748
-0.1212049162	0.3660731918	16343/16384	0.997498
-0.1211407622	0.3663404677	2011/2016	0.99752
-0.1208854224	0.3660688573	2027/2032	0.997539
-0.1208499511	0.3659427354	407/408	0.997549
-0.1208364703	0.3658541256	2039/2044	0.997554
-0.1208276349	0.3657605821	2041/2046	0.997556
-0.1206347855	0.3658544799	2043/2048	0.997559
-0.1206887402	0.366044121	16345/16384	0.99762
-0.1204700063	0.3661957641	8173/8192	0.997681
-0.1202510868	0.3664230691	16347/16384	0.997742
-0.1198744573	0.3657424317	4087/4096	0.997803
-0.1195821677	0.3657507764	16349/16384	0.997864
-0.1196036206	0.365282917	8175/8192	0.997925
-0.1196080209	0.3649637748	16351/16384	0.997986
-0.1191790158	0.3643597888	511/512	0.998047
-0.1191790158	0.3643597888	511/512	0.998047
-0.1193835288	0.3645413997	16353/16384	0.998108
-0.1192801034	0.3646893975	8177/8192	0.998169
-0.1192622749	0.3647925498	16355/16384	0.99823
-0.1190649583	0.3648445798	4089/4096	0.998291
-0.1191062596	0.3648641904	1789/1792	0.998326
-0.1191014878	0.3649132102	16357/16384	0.998352
-0.1189816725	0.3650148756	8179/8192	0.998413
-0.1190226044	0.3650627495	639/640	0.998437
-0.1188350598	0.3650804917	16359/16384	0.998474
-0.1188065533	0.365128207	1981/1984	0.998488
-0.1187093863	0.3650525719	671/672	0.998512
-0.1186757347	0.3649963321	2029/2032	0.998524
-0.118657604	0.3649528757	679/680	0.998529
-0.1186429595	0.3649107562	2041/2044	0.998532
-0.118624614	0.3648547955	681/682	0.998534
-0.1185357745	0.3649652592	2045/2048	0.998535
-0.1185976503	0.3650586697	16361/16384	0.998596
-0.1185462375	0.365165317	8181/8192	0.998657
-0.1185624969	0.3652927241	16363/16384	0.998718
-0.1181083167	0.3652765218	4091/4096	0.998779
-0.1179828438	0.3655061162	16365/16384	0.99884
-0.117586317	0.3652077794	8183/8192	0.998901
-0.1173940596	0.3648947613	16367/16384	0.998962
-0.1171699804	0.364235175	1023/1024	0.999023
-0.1171699804	0.364235175	1023/1024	0.999023
-0.1171981156	0.3644857544	16369/16384	0.999084
-0.1170443007	0.3645757443	8185/8192	0.999146
-0.1169804196	0.3646908994	16371/16384	0.999207
-0.1166765578	0.3646392209	4093/4096	0.999268
-0.1166724348	0.3647835555	16373/16384	0.999329
-0.11670503	0.3647980975	1535/1536	0.999349
-0.1163699284	0.3648541992	8187/8192	0.99939
-0.1159947642	0.3648091279	16375/16384	0.999451
-0.1157646378	0.3646120485	1919/1920	0.999479
-0.11581972	0.3644406844	1983/1984	0.999496
-0.1158614081	0.3643460497	2015/2016	0.999504
-0.1158974063	0.3642777905	2031/2032	0.999508
-0.1159328159	0.3642173023	2039/2040	0.99951
-0.1159739497	0.3641511337	2043/2044	0.999511
-0.1160364006	0.3640548004	2045/2046	0.999511
-0.1157313685	0.3641008984	2047/2048	0.999512
-0.1156126577	0.3643463071	16377/16384	0.999573
-0.1153471247	0.3643813154	8189/8192	0.999634
-0.115119368	0.3645361712	16379/16384	0.999695
-0.1146659039	0.3639741884	4095/4096	0.999756
-0.1143620323	0.3641752478	16381/16384	0.999817
-0.1138548025	0.3638604327	8191/8192	0.999878
-0.1132230604	0.3637604256	16383/16384	0.999939
-0.0795956234	0.3651645091	1	1
-0.1121670449	0.364255521	1/16384	6.10352e-05
diff --git a/sandbox/rabbit-zoom.png b/sandbox/rabbit-zoom.png
deleted file mode 100644
index be82499..0000000
Binary files a/sandbox/rabbit-zoom.png and /dev/null differ
diff --git a/sandbox/rees-F.g b/sandbox/rees-F.g
deleted file mode 100644
index d9341d5..0000000
--- a/sandbox/rees-F.g
+++ /dev/null
@@ -1,85 +0,0 @@
-F := function(angle)
-    local gens, airplane, mating, pol, admaddresses, count, hom, basis,
-    v, f, a, b, c, x, y, z, n, i, t, xx, yy ,zz, image;
-
-    if angle <1/7 or angle >=2/7 then return fail; fi;
-    airplane := PolynomialIMGMachine(2,[3/7],[]);
-    if IsOddInt(DenominatorRat(angle)) then
-        pol := ChangeFRMachineBasis(PolynomialIMGMachine(2,[angle],[]),(1,2));
-    else
-        pol := ChangeFRMachineBasis(PolynomialIMGMachine(2,[],[angle]),(1,2));
-    fi;
-    mating := Mating(airplane,pol);
-    gens := GeneratorsOfFRMachine(mating);
-    n := Length(gens) -3;
-    f := StateSet(mating);
-    a := f.1; b := f.2; c := f.3;
-    xx:=[1];
-    yy:=[]; 
-    zz:=[];
-    x :=One(f.1); y:=One(f.1); z:=One(f.1);
-    t:=ADMADDRESSES@fr(pol);  
-    if t = [fail,fail] then return fail; fi;
-    admaddresses := t[2];
-    image := t[1];
-
-    t := angle;
-    count :=[0,0,0,0];
-    count[2]:= count[2]+1;
-    for i in [2..n] do
-        t:=2*t;
-        if t>1 then t:=t-1; fi;  
-        if t<1/7 then count[1]:= count[1]+1; continue; fi; 
-        if t<2/7 then count[2]:= count[2]+1; continue; fi; 
-        if t<4/7 then count[3]:= count[3]+1; continue; fi; 
-        count[4]:= count[4]+1; 
-    od; 
-
-#    v := ExtRepOfObj(IMGRelator(pol));#???
-#    v := v{[1,3..Length(v)-1]};#???
-    for i in [1..count[4]] do
-        z := z*gens[n+4-i];
-    od;
-    for i in [1+count[4]..count[4]+count[3]] do
-        y := y*gens[n+4-i];
-    od;
-    for i in [1+count[4]+count[3]..count[4]+count[3]+count[2]] do
-        x := x*gens[n+4-i];
-    od;
-    for i in [1+count[4]+count[3]+count[2]..count[4]+count[3]+count[2]+count[1]] do
-        z := z*y*x*gens[n+4-i]*x^-1*y^-1;
-    od;
-
-    basis:=ShallowCopy(gens);
-    basis[2]:=b^(x*c^-1*x^-1*y^-1*a^-1);
-    basis[3]:=c^(x^-1*y^-1*a^-1);
-    for i in [1..count[4]] do
-        basis[n+4-i]:=basis[n+4-i]^(a^-1);
-    od;
-    for i in [1+count[4]..count[4]+count[3]] do
-        basis[n+4-i]:=basis[n+4-i];
-    od;
-    for i in [1+count[4]+count[3]..count[4]+count[3]+count[2]] do
-        basis[n+4-i]:=basis[n+4-i]^(c^-1*x^-1*y^-1*a^-1);
-    od;
-    for i in [1+count[4]+count[3]+count[2]..count[4]+count[3]+count[2]+count[1]] do
-        basis[n+4-i]:=basis[n+4-i]^(x^-1*y^-1*a^-1);
-    od;
-
-    mating := ChangeFRMachineBasis(mating,[Inverse(y*a),Inverse(a*y*x*c*x^-1)]);
-    hom := GroupHomomorphismByImages(f,f,basis,gens);
-    mating := mating^hom;
-
-    x := FreeGroup(n);
-    hom := GroupHomomorphismByImages(x,f,GeneratorsOfGroup(x),gens{[4..n+3]});
-    x := SubFRMachine(mating,hom);
-    if x=fail then
-        return mating; # could not find submachine
-    fi;
-    y := SupportingRays(x);
-    if not IsList(y) then # could not find supporting ray
-        return y;
-    fi;
-    y := 2-2*y[2][1][1];
-    return y-Int(y);
-end;
diff --git a/sandbox/rees-data.gz b/sandbox/rees-data.gz
deleted file mode 100644
index 45199ef..0000000
Binary files a/sandbox/rees-data.gz and /dev/null differ
diff --git a/sandbox/referee.pdf b/sandbox/referee.pdf
deleted file mode 100644
index c8f2245..0000000
Binary files a/sandbox/referee.pdf and /dev/null differ
diff --git a/sandbox/sarah.g b/sandbox/sarah.g
deleted file mode 100644
index 3c27da7..0000000
--- a/sandbox/sarah.g
+++ /dev/null
@@ -1,5 +0,0 @@
-g := FRGroup("a=<e^-1,1,1,e^-1>",
-             "b=<a^-1,1,e/a/e,1>(1,2)(3,4)",
-             "c=<e,a*d,1,e*a*d>",
-             "d=<a*c,a*c,e,e>(1,3)(2,4)",
-             "e=<1,1,c^-1/a/d/b,c^-1/a/d/b>");
diff --git a/sandbox/sierpinski-maps b/sandbox/sierpinski-maps
deleted file mode 100755
index b8d6743..0000000
--- a/sandbox/sierpinski-maps
+++ /dev/null
@@ -1,6 +0,0 @@
-
-fold0 := NewIMGMachine("a=<1,b,1,1,B,1>","b=<1,c,1,1,C,1>","c=<b^-1*c^-1,1,c*b*a,B^-1*C^-1,1,C*B*A>(1,2,3)(4,5,6)","A=(1,6)(2,5)(3,4)","B=<a^-1*b^-1*c^-1,1,1,c*b*a,1,1>(1,4)(2,6)(3,5)","C=<1,1,1,1,1,1>");
-
-fold3 := NewIMGMachine("a=<a^-1,1,b*a,A^-1,1,B*A>(1,2,3)(4,5,6)","b=<1,1,c,1,1,C>","c=<a,1,1,A,1,1>","A=(1,6)(2,5)(3,4)","B=<a^-1*b^-1*c^-1,1,1,c*b*a,1,1>(1,4)(2,6)(3,5)","C=<1,1,1,1,1,1>");
-
-((-0.0997478-I*0.253173)*z^6+(-1.8627-I*0.899578)*z^5+(4.53598+I*0.666373)*z^4+(-2.33911+I*1.88928)*z^3+(2.39538-I*2.95044)*z^2+(3.40135+I*0.64184)*z+(-0.500865+I*0.683808))/((0.569114+I*0.0164565)*z^6+(-0.32279+I*2.61196)*z^5+(-0.281454-I*0.393524)*z^4+(-0.571207+I*1.69902)*z^3+(-1.1612-I*4.51325)*z^2+(0.738798+I*0.317797)*z+1)
diff --git a/sandbox/sierpinski.g b/sandbox/sierpinski.g
deleted file mode 100644
index c65706f..0000000
--- a/sandbox/sierpinski.g
+++ /dev/null
@@ -1,55 +0,0 @@
-FindCantor := function(M,multicurve,limit)
-    # search for a cantor multicurve, i.e. a curve lifting to a multiple of itself
-    local len, w, x, mat, row, i, j, c, d, group, pi, gens, peripheral;
-    
-    len := Length(multicurve);
-    gens := GeneratorsOfGroup(StateSet(M));
-    group := FreeGroup(Length(gens)-1);
-    c := IMGRelator(M);
-    pi := GroupHomomorphismByImagesNC(StateSet(M),group,List([1..Length(gens)],i->Subword(c,i,i)),Concatenation(GeneratorsOfGroup(group),[Product(List(Reversed(GeneratorsOfGroup(group)),Inverse))]));
-
-    w := PUSHRECURSION@fr(pi,M);
-
-    peripheral := List(GeneratorsOfSemigroup(StateSet(M)),x->CyclicallyReducedWord(x^pi));
-    
-    multicurve := List(multicurve,x->CyclicallyReducedWord(x^pi));
-    mat := [];
-    for i in multicurve do
-        d := w(i);
-        row := List([1..len],i->0);
-        for i in Cycles(PermList(d[2]),AlphabetOfFRObject(M)) do
-            c := CyclicallyReducedWord(Product(d[1]{i}));
-#            Error(c,"\n");
-            if ForAny(peripheral,x->IsConjugate(group,x,c)) then
-                continue; # peripheral curve
-            fi;
-            j := First([1..len],j->IsConjugate(group,c,multicurve[j])
-                       or IsConjugate(group,c^-1,multicurve[j]));
-            if j<>fail then
-                row[j] := row[j] + 1;
-            elif len<limit then # add one more curve
-                for j in mat do Add(j,0); od;
-                Add(row,1);
-                len := len+1;
-                Add(multicurve,c);
-            fi;
-        od;
-        Add(mat,row);
-    od;
-    Info(InfoFR,1,"Thurston matrix is ",mat);
-
-    x := List(EquivalenceClasses(StronglyConnectedComponents(BinaryRelationOnPoints(List([1..len],x->Filtered([1..len],y->IsPosRat(mat[x][y])))))),Elements);
-    for i in x do
-        if PERRONMATRIX@fr(mat{i}{i}) then # there's an eigenvalue >= 1
-            d := rec(machine := M,
-                     obstruction := [],
-                     matrix := mat{i}{i});
-            for j in i do
-                c := [PreImagesRepresentative(pi,multicurve[j])];
-                Append(d.obstruction,c);
-            od;
-            return d;
-        fi;
-    od;
-    return fail;
-end;
diff --git a/sandbox/springborn/bu_headNoEars.obj b/sandbox/springborn/bu_headNoEars.obj
deleted file mode 100644
index ce5bcca..0000000
--- a/sandbox/springborn/bu_headNoEars.obj
+++ /dev/null
@@ -1,3505 +0,0 @@
-# Vertices: 737; Half edges: 4360; Facets: 1444
-# v1...
-v -0.35359260387372032 0.13777704587505213 0.39596256020085685
-v 0.38816573842961138 0.4415660594413876 -0.23523438908182276
-v 0.44600632307970772 0.26071025525999458 -0.092068105017780441
-v 0.20086627989181721 0.37052184122826526 0.037015865343726813
-v -0.38399493670074075 -0.36515603450966222 0.091986094871426213
-# v6...
-v 0.10900320023992226 0.3675811916947076 -0.00045105580494809159
-v -0.13789420322698681 0.18587013884419235 -0.11361334203854753
-v -0.2971813389172257 0.3085807492604592 -0.26699574719128422
-v -0.24270317026765148 -0.29693530847816318 0.65387275474961537
-v 0.16028297318168275 0.3439739852798922 0.065203924219183931
-# v11...
-v 0.015183592810720023 0.19912063534799193 0.15857833371103477
-v 0.35523280680080427 0.21250000493891966 -0.006449512223997987
-v -0.057817153179709431 0.19967127490208464 0.14434371545098476
-v 0.14586090315853745 0.32779455497772841 -0.091189424878271169
-v 0.17037022118324907 0.33099295068554208 0.064055782170225159
-# v16...
-v -0.18369101209820948 0.24570239847717634 -0.11238318984323456
-v 0.2937134812999625 0.47216755976669683 -0.046154138794623149
-v -0.28639114680405192 -0.029675957245026214 0.62513405632006569
-v -0.14454874081687027 0.24204708909681774 -0.18654379361781623
-v -0.42794065941139736 -0.18479229120639454 0.055245549304745629
-# v21...
-v 0.11755568693114575 0.31332562201380909 0.086913181532659423
-v -0.15135558296426865 0.14864924813458019 -0.011440415416410594
-v -0.24753005316735563 -0.12518263054208614 0.6538493232792284
-v -0.29222558293039341 0.088254633212310044 -0.056194523855415644
-v -0.41827517787679541 -0.2468388247909418 0.0464353164392661
-# v26...
-v 0.091593617742445413 0.32201869752735396 0.075970684861970741
-v -0.32178438282348509 -0.14335373582713762 0.67120032710073796
-v -0.33086407759841407 -0.073246776429492136 0.64590605481806473
-v -0.088945861588724195 0.11312713902801903 0.45259642412602719
-v -0.16582451592818784 0.10400058131231615 0.49560488802120717
-# v31...
-v -0.20895013717530245 0.2328736684403413 -0.059158604859360218
-v 0.073949720541099426 -0.13339536091269943 0.28726396907596452
-v -0.34400913248547266 -0.17754025112164468 0.65955488631844195
-v 0.25238036753744686 0.43781702417948126 -0.012822872169238501
-v -0.14528683213405799 0.13925322850942787 0.45249098250928604
-# v36...
-v -0.32276850457973549 0.34800419818644152 -0.43619439485518763
-v -0.46325188528447608 -0.30087179550316473 0.51881375943944508
-v -0.29835291243657142 0.16955011971970693 0.33596628027516451
-v 0.30653049560160428 0.2068881677812541 0.031181429217385322
-v -0.19074388468467054 0.1617122928752843 0.40273425514267497
-# v41...
-v 0.22190774029926563 0.40121706743512225 0.018118384476680963
-v -0.31753157094826023 0.27099667075984957 -0.2840655733681508
-v -0.12252315865317145 0.080533963719822077 -0.002161553143192791
-v -0.34826194436069746 0.15313637471367408 0.35193482734384618
-v -0.12137501660421268 -0.20818861438772779 -0.054261427548495271
-# v46...
-v -0.44340542986676035 -0.48874532506543822 0.25380382936345181
-v -0.2617529556922123 -0.23226445021028158 0.67409411369352179
-v -0.26355717891200464 0.038989966723824272 0.57567022233329102
-v -0.029511936952317738 0.18715886971547258 0.0193836838775743
-v 0.049522412662742002 0.26031192026341698 0.11968209286875814
-# v51...
-v -0.38175723127879052 -0.37982413497187018 0.33826256437308205
-v -0.26660327006230339 0.26744680299623214 -0.13347151319145684
-v -0.50095312113702029 -0.17062796735750507 0.27375572639790879
-v -0.30130527770532256 0.057617985681420708 0.55373836605113991
-v -0.1990854881424117 0.18228512387499454 0.29452772489590773
-# v56...
-v -0.2686886709267387 -0.066381355606126402 0.64237961852483416
-v 0.20520110191339624 0.41274535086548358 0.0048561722376878466
-v -0.2796311675974274 0.32394007809908121 -0.26537897573458719
-v -0.12135158513382574 0.15817414084686038 -0.17430085034065387
-v -0.24730745419868005 0.0029055023279772707 0.59889080948672246
-# v61...
-v -0.49330274605569296 -0.26766940196490807 0.26715976748399262
-v -0.31097075923992434 -0.20176839150171338 0.65934400308495966
-v 0.29238960322310187 0.17498622084947113 -0.00063850756804340525
-v -0.36241455247439336 -0.2870355122396922 0.021293348714107763
-v -0.40563389960305551 -0.37906261218429554 0.26227430590832113
-# v66...
-v -0.41221814278177815 -0.47828317353768124 0.090158440181246954
-v -0.28328647697778586 -0.18175791579128911 0.67047395151874367
-v -0.29897384640182462 -0.10316876411358086 0.66315161702283321
-v -0.11227189035889673 0.17522053555334019 0.31232392665476866
-v -0.43762957241638606 -0.48657791405464867 0.1606403031050832
-# v71...
-v -0.37434117090133229 -0.39240683456964287 0.057401244580341688
-v -0.21761978121846037 -0.26756396034816698 0.66610398229158418
-v 0.1875923519176306 0.41256961483758192 -0.0085114816180463879
-v -0.22603167908736249 -0.21319123331533382 0.67267650973511361
-v 0.029500221217124267 -0.26978995003492373 0.41851535044826127
-# v76...
-v -0.07201662423417908 0.17428327673786367 0.20062610732035133
-v 0.27109039664139739 0.46821935700650186 -0.043412656759354254
-v -0.29322142042183724 -0.28118936037815723 0.65175220667959965
-v -0.40640713812582363 -0.30546436369899965 0.074412492081240997
-v -0.44469416073804058 -0.52848509884164385 0.21529420778255923
-# v81...
-v -0.18269517460676563 0.19158741761859946 -0.024151988101311247
-v -0.25960897615180967 0.18029344889210686 0.21675867468174134
-v -0.20387722383653561 0.18495631149910277 0.025417287502204566
-v 0.49856311115755503 0.33416791492296882 -0.21722730408947963
-v -0.25166570769064595 0.17901643375602008 0.31117578460580991
-# v86...
-v -0.15490545072788606 0.14498222301902813 0.024655764714629869
-v -0.3151298452336016 -0.017116689117640624 0.61473048346827608
-v -0.044882981526133091 0.16031812038726315 0.23785871376515708
-v -0.50033218717176697 -0.21869762885625851 0.32463716434309176
-v -0.20971165996287708 0.28185715728418415 -0.1532125269924316
-# v91...
-v -0.39480856028430134 -0.35108543654232066 0.33600142748074491
-v -0.24737774860984071 0.29216700425442604 -0.16484625203953418
-v -0.25145482445716372 -0.2632994327377487 0.6698647332886839
-v -0.19832396535483704 -0.067482634714311471 -0.049141651268954638
-v -0.27117240678775156 -0.38521337316086035 -0.057483254726695902
-# v96...
-v -0.15723688203138403 0.20829405600446868 -0.099038967457887248
-v -0.32094084988955618 0.11938334162132506 0.46035224082409559
-v -0.26449443772748116 -0.48383643201937981 0.497678573150449
-v -0.24139100792598431 -0.41443241673334164 0.48813024896778173
-v -0.0035381520284239213 0.23289709991072824 0.13219449805537001
-# v101...
-v -0.031199002820175497 -0.30723343971321182 0.4567437943845109
-v -0.20905557879204351 -0.3758759322116752 0.48795451293987985
-v -0.18924427057990803 -0.39130555546145779 0.49392953788854288
-v -0.14344746170868536 -0.35578344635489678 0.48879804587380876
-v 0.091546754801671612 0.24805726125106123 0.11613222510514074
-# v106...
-v -0.13229408180451438 0.13067731034781735 -0.05969752867825924
-v -0.089719100111492311 -0.32256933708144669 0.47304038203860937
-v -0.24143787086675819 -0.068853375731945651 -0.04238167206233006
-v 0.37641485603057423 0.34760586318986392 -0.19745114308292452
-v -0.046769214892279656 0.097404622398399865 0.025557876324526049
-# v111...
-v -0.0086579283079645502 -0.26934475209757242 0.44414937905154478
-v -0.14546256816195985 0.072707852610592899 0.49938907048869369
-v 0.23642353620395867 0.15091038502691734 -0.006238628990515767
-v -0.061671630058356679 0.051619529262370671 0.42037815234402087
-v 0.0065373802379489407 -0.068829944261558723 0.3716992726152078
-# v116...
-v 0.3728649882669568 0.32276850457973533 -0.10402987065029984
-v -0.067916116916469149 -0.20315084825454136 0.51985645987166285
-v -0.030870962234758704 -0.20340859442879736 0.48875118293303488
-v 0.10279386058739011 0.19370796568861501 0.1094659717800638
-v 0.2046504623593037 0.24308978952903545 -0.11300412380848777
-# v121...
-v -0.1729359671906161 -0.2035023203103451 0.64152436985571182
-v 0.073071040401590182 0.18991206748593509 0.13292087363736435
-v 0.25148997166274412 0.37305244003005189 -0.025991358526683966
-v 0.1995189703445697 0.16090390714693592 0.067851680372905177
-v -0.098400459889843805 -0.15791639467260471 0.52618295687612948
-# v126...
-v 0.17322886057045256 0.20244790414293373 0.097562784823511647
-v 0.15995493259626595 0.24902966727211814 0.051414503896485247
-v 0.34549703085504163 0.50078910084431183 -0.093181099861158828
-v 0.31835167241180218 0.47128887962718735 -0.066656675383172589
-v 0.077979933447648628 0.11468533180874872 0.13808751285767881
-# v131...
-v -0.18705342809873154 -0.31046698262660588 0.61129777305659327
-v 0.41333113762515661 0.22930036920633698 -0.065039903926475545
-v -0.14513452757654305 0.31846882976373658 -0.42866117712579493
-v 0.11566945356499919 0.10801907848367195 0.10172187081718884
-v 0.1913765343851172 0.28346221300568769 0.01711083125004368
-# v136...
-v 0.13590252824409912 0.099431444586867979 0.067289325083619247
-v 0.05329487939503505 -0.1726079266051993 0.36468154723432716
-v 0.26094456996386378 0.24208223630239814 0.023870810456668265
-v -0.20107716312529939 0.04562107284332096 0.55278939150046991
-v -0.053095711896746327 0.10855800230257086 0.39844629606186971
-# v141...
-v 0.11404096637310869 0.17667328671732865 0.12414578797746519
-v -0.19718753904107172 -0.20910244173281736 0.66287043937819012
-v 0.38843520033906093 0.52364650020674586 -0.15224012097137465
-v -0.091816216711121071 -0.24320694688097014 0.52357034792798862
-v 0.2957754506940109 0.22134538500997963 0.042451966473490782
-# v146...
-v 0.023782942442717312 -0.13175515798561549 0.40302714852251137
-v -0.14840321769551751 -0.21442138551064671 0.61096973247117647
-v -0.16268469889634135 -0.0073574817014910874 0.53248602241020926
-v 0.025634028603283551 0.098341881213876381 0.18060391587473359
-v -0.21349584243036368 -0.073949720541099592 0.61398067641589493
-# v151...
-v -0.063018939605604257 -0.16994845471628453 0.51043700877612341
-v -0.079210085642961517 -0.022095876574859549 0.43440188737058871
-v -0.15007856782818191 -0.16940953089738564 0.59505976407846206
-v -0.064354533417658288 -0.29431098379482884 0.47608647318890807
-v 0.25076359608074977 0.34411457410221352 -0.037695377984947327
-# v156...
-v 0.1694212466325791 0.2240400041044748 0.067383050965166905
-v -0.052662229694588399 -0.040184971713557088 0.42308448717370944
-v -0.18906853455200617 0.0089273902174139205 0.56246658877026523
-v 0.31833995667660875 0.4240158881215893 -0.088787699163612524
-v 0.44853692188149435 0.29911443522414605 -0.11690546362790891
-# v161...
-v 0.39328551470915202 0.46908632141081752 -0.16356923690344743
-v -0.12428051893218994 -0.055567732022565666 0.47849991463876018
-v 0.21952944605499389 0.21962317193654138 0.074248471788532597
-v -0.17765740847357919 -0.10116537339549969 0.58136406963731113
-v 0.11641926061738045 0.2230558823482244 0.089959272682958197
-# v166...
-v 0.41013274191734289 0.26370948346951961 -0.059826401765387255
-v 0.39418762631904813 0.23896585074093876 -0.030056718638813484
-v 0.23644696767434553 0.20336173148802331 0.070932918728784308
-v -0.07875317197041673 0.0029757967391380821 0.42859088271463414
-v -0.17900471802082676 -0.24867819521631457 0.65176392241479308
-# v171...
-v -0.19391884892209726 -0.28434089314519706 0.64779228818421131
-v -0.11432214401775169 0.052240463227623858 0.48361969091830082
-v -0.13150912754655281 -0.034690291907825549 0.47824216846450418
-v 0.41852120831585804 0.40194344301711665 -0.17002460699504213
-v -0.47719361016468981 -0.30448024194274931 0.24788738309075614
-# v176...
-v -0.14263907598033684 -0.32801715394640418 0.49380066480141477
-v -0.11197899697906026 -0.27794410172956974 0.51309648066503821
-v -0.046616910334764651 -0.13098191946284721 0.47729319391383412
-v 0.12578013303695246 0.27672566526945014 0.092396145603197213
-v 0.47508477782986758 0.29841149111253862 -0.13949340108089364
-# v181...
-v 0.24822128154376968 0.2781432692278582 -0.013912435542229987
-v -0.16474666829038986 -0.32155006811961589 0.5443189149556007
-v -0.31265782510778223 0.10408259145867044 0.01920794784967245
-v 0.063768746657985514 0.14326000994558988 0.15399748125039317
-v -0.0097357759457625988 0.071325395857764914 0.27035816319180633
-# v186...
-v 0.35083940610325798 0.19791391462306598 -0.031872657593799286
-v -0.44453014044533218 -0.027426536087882532 0.3421287569869228
-v -0.019670719389814 -0.099829779583445577 0.43488223251352048
-v 0.16122023199715935 0.17313513468890473 0.099718480099107706
-v -0.45704254563194407 -0.065865863257614427 0.30252957203303871
-# v191...
-v -0.13858543160340081 -0.12149217395614745 0.53671540281504715
-v -0.0067716949418180671 0.012395247834677357 0.28881044612150081
-v -0.037408342472707648 0.022623084658564982 0.38804272321008004
-v 0.045468768285805948 -0.11675901693799071 0.34755314238149332
-v 0.4696955396408774 0.35815002486397485 -0.18114283969363262
-# v196...
-v 0.17445901276576553 0.30062576506410188 0.045216879979146592
-v 0.05721965068484311 0.21600300976176318 0.13992688328305153
-v 0.069919507634550321 0.069064258965427769 0.11472633688192591
-v -0.14936390798138097 -0.07152456335605388 0.51651747534152759
-v -0.1123656162404444 -0.10494955586298613 0.50445026809226701
-# v201...
-v 0.043277925804629531 -0.2177955172463624 0.38632051013664198
-v 0.023443186122107131 -0.18543665664203465 0.4208233502813723
-v -0.22959326258617335 -0.030039145036023413 0.60916550925138413
-v -0.12774837654945315 0.0012535836656998329 0.48160458446502624
-v -0.1245031179008656 0.18659651442618674 -0.16046456707718135
-# v206...
-v -0.14135034510905661 -0.29319798895145049 0.54728299595954522
-v 0.021931856282151153 -0.23552142459406258 0.42533390833085311
-v 0.26197555466088795 0.4154282542247853 -0.017368577424299741
-v -0.078085375064389673 -0.094089069338651854 0.48105394491093378
-v -0.0373497637967403 -0.23464274445455324 0.48728671603385276
-# v211...
-v 0.37035782093555702 0.28300529933314278 -0.068519477278932234
-v -0.050635407506120375 -0.26943847797912002 0.48496700046554836
-v -0.14315456832884882 0.21534692859092991 -0.53909369705931887
-v 0.38673641873600961 0.41931787830901296 -0.15116227333357665
-v -0.30675309457027994 -0.31845711402854343 0.61270366127980802
-# v216...
-v -0.018042232197923499 -0.037420058207901112 0.37967768828195192
-v -0.13418031517066104 -0.24305464232345522 0.57849371451491416
-v -0.16238008978131149 -0.27205108692726088 0.61949878769201305
-v -0.1219373718934986 0.28177514713782986 -0.61515224993524054
-v 0.33579640211485939 0.38881010386525144 -0.10883332207961714
-# v221...
-v -0.0047331570181565743 -0.17668500245252244 0.45374456617498593
-v 0.23379921152062433 0.30083664829758433 -0.018633876825193081
-v 0.33900651355786654 0.25496954501520086 -0.022617226790968403
-v 0.45274287081594533 0.44577200837583858 -0.21654779144825914
-v 0.311626840410758 0.34643428967051804 -0.084218562438164363
-# v226...
-v 0.035955591308719011 0.056879894364232846 0.14653455793216119
-v 0.33031343804432162 0.23775913001601279 0.011194384977347984
-v -0.48101293983775667 -0.24958030682621068 0.36253756769392459
-v -0.26684930050136607 -0.036599956744359292 -0.029623236436655577
-v -0.47988822925918478 -0.22758987186809218 0.39127626612347416
-# v231...
-v -0.30273459739892428 0.19801935623980718 -0.11706948392061729
-v -0.48466824921811524 -0.20702875660357556 0.47641451377432487
-v -0.11684102708434491 -0.19922607696473332 0.55303542193953248
-v -0.19456321435773738 -0.15528035425407688 0.63605312152036753
-v 0.36226224791687839 0.48778463477957479 -0.11900258022753765
-# v236...
-v 0.0096069028586346084 0.14084656849573796 0.18696556008478069
-v -0.099255708558966191 0.024649906847033089 0.46384352991174577
-v -0.082771669141772461 0.065971304874355319 0.44461800845928307
-v -0.28562962401647729 0.10820653024676713 -0.14879569482449836
-v -0.4535864037498743 -0.31723867756842383 0.49043824880089265
-# v241...
-v -0.45756975371564951 -0.3164420075752688 0.16892332788685716
-v -0.12891995006879886 0.42239911666489227 -0.62890652305235883
-v 0.4738546256345546 0.45902250487963814 -0.25604153478540209
-v -0.12565125994982437 0.13423889384662821 -0.21600886762936011
-v 0.47277677799675655 0.27835415246134065 -0.14071183754101316
-# v246...
-v -0.12693999082110463 0.14514624331173637 -0.29120045610096601
-v 0.49544672559609548 0.42783521779465611 -0.28268311661532292
-v -0.34832052303666466 -0.37428259222536508 0.3934436771342637
-v 0.19257153937484978 0.13230579753970784 0.046962524522971658
-v 0.43717265874384126 0.24524548480463171 -0.10787263179375368
-# v251...
-v 0.033671022945994923 -0.051033742502697897 0.12825801103036855
-v 0.49152195430628742 0.39271144368467259 -0.2841007205737312
-v -0.026875896533789918 0.10633201261581411 0.34219905139808354
-v -0.37818393204478623 -0.34737154848599483 0.38270034796186381
-v -0.12859190948338206 0.36775692772260959 -0.56992951208849729
-# v256...
-v -0.12662366597088129 0.078659446088869073 -0.04122181427817783
-v 0.024778779934161162 0.024532749495098403 0.15364600919458946
-v -0.36581211568049582 -0.34113877736307574 0.56660224329355557
-v -0.0073574817014908436 0.11008104787772015 0.25294858069432946
-v -0.14151436540176501 0.085208542062011478 -0.18778566154832266
-# v261...
-v 0.00052720808370559642 -0.032534596632229608 0.32573844345127667
-v -0.11692303723069911 0.4034079099162986 -0.66182773894597258
-v -0.13056015299588283 0.31281012966529714 -0.48705240132998368
-v -0.021135186288996105 0.038322169817797215 0.33275616883215736
-v 0.50192552715807714 0.37695377984947298 -0.26439485397833679
-# v266...
-v -0.13510585825094407 0.21362471551749168 -0.45469354072565593
-v -0.40270496580469128 -0.36380872496241479 0.13823981741519376
-v -0.42946370498654662 -0.4404530645980092 0.25365152480593689
-v -0.12203109777504627 0.3270096007197667 -0.56797298431118992
-v -0.45714798724868516 -0.32781798644811538 0.23762439906128796
-# v271...
-v -0.43267381642955394 -0.3455907567365894 0.19706452382154044
-v -0.49250607606253788 -0.18739318441934197 0.35562528392978504
-v -0.48798380227786342 -0.24066463234399008 0.49271110142842334
-v 0.49566932456477114 0.37963668320877469 -0.23497664290756673
-v 0.1704053683888295 0.1159623469448355 0.024655764714629869
-# v276...
-v -0.12116413337073041 0.22568020703155878 -0.25381554509864529
-v -0.29289337983642044 0.14888356283844925 -0.10260055095669812
-v -0.37046326255229811 0.070317842631127919 0.084558318758774606
-v -0.4161194826011993 -0.4113746098478494 0.16292487146780726
-v -0.23326028770172527 0.47228471711863118 -0.60145655549408961
-# v281...
-v -0.39943627568571682 -0.18897480867045857 0.016489897284790469
-v -0.47195667653321455 -0.15544437454678511 0.47566470672194361
-v -0.12754920905116443 0.26858322930999762 -0.53336470254971857
-v -0.22999159758275081 0.078038512123615886 -0.27472813241896576
-v 0.013742557381924855 -0.041977479198155823 0.07140154813652258
-# v286...
-v 0.012242943277162346 0.010052100795985924 0.23939347507549996
-v -0.11562259062422539 0.37428259222536508 -0.6341083094782537
-v -0.27315236603544579 0.10766760642786823 -0.27662608152030571
-v -0.26581831580434184 0.276831106886191 -0.39948899649408742
-v 0.48916709153240262 0.33441394536203134 -0.24152573888070911
-# v291...
-v -0.44566656675909749 -0.23382264299101127 0.089795252390249797
-v -0.12622533097430377 0.26911043739370305 -0.42741930919528848
-v 0.036365642040490004 -0.037384911002320706 0.20369562994103702
-v -0.44256189693283143 -0.049334960899646584 0.40537029556120274
-v -0.26585346300992224 0.18494459576390931 -0.24632919031002637
-# v296...
-v 0.041169093469807308 0.041297966556935295 0.098312591875892905
-v -0.47427639210151906 -0.28851169487406775 0.46844781384277423
-v -0.12326124997035924 0.1902283923361584 -0.34729539620723732
-v 0.49013949755345954 0.31220091143523743 -0.17829591604162262
-v 0.25866000160113972 0.17294768292580956 0.034567276688294339
-# v301...
-v -0.40838709737351786 -0.42114553299919244 0.11860424523096014
-v -0.039517174807529871 0.068911954407913006 0.38170451047041992
-v -0.46024094133975774 -0.21055519289680599 0.11998670198378804
-v -0.48622644199884496 -0.23990310955641542 0.17993611896870657
-v 0.47208554962034255 0.2792328326008498 -0.16518600836014447
-# v306...
-v 0.0050377661331864306 0.052263894698010793 0.21580970013107137
-v -0.48267657423522753 -0.23443186122107099 0.43154324798338528
-v -0.12583871171291972 0.12799440698851566 -0.12338426518989051
-v -0.46284183455270517 0.014738394873368463 0.30310364305751814
-v -0.26320570685620093 0.43868398858379726 -0.58314486138671651
-# v311...
-v -0.1198636867642567 0.23360004402233536 -0.35035320309272949
-v 0.020982881731481176 0.0044988423142873655 0.11054381941786183
-v -0.46174055544452025 -0.020936018790707465 0.25203475334923986
-v -0.24505803304153637 0.41433869085179403 -0.57868116627800947
-v -0.28498525858083718 0.11682931134915152 -0.057166929876472559
-# v316...
-v -0.39519517954568545 -0.44593602866854698 0.064852452163380231
-v -0.29861065861082742 -0.31366537833441954 -0.0055708320844887211
-v -0.39377757558727722 -0.01272328842009415 0.0775874563186678
-v -0.13795278190295399 0.28459863931945317 -0.33686839188506074
-v -0.11777828589982141 0.18833044323481846 -0.25545574802572923
-# v321...
-v 0.078436847120193415 0.065057477529265759 0.068566340219706035
-v -0.14745424314484754 0.45451194683015733 -0.63954441060801759
-v -0.18196879902477139 0.46846538744556437 -0.61481249361463031
-v -0.15530378572446366 0.44651009969302646 -0.60618971251224607
-v -0.15034802973763134 0.37749270366837223 -0.528198063329404
-# v326...
-v -0.22077131398550032 0.46828965141766266 -0.57444007013797804
-v -0.27802611187592385 0.1357619394217775 0.45123739884358621
-v -0.12392904687638621 0.17886412919850531 0.25980228578250175
-v -0.052404483520332334 0.15319495338964145 0.34573720342650749
-v 0.1670663838586943 0.37666088646963658 0.038374890626167807
-# v331...
-v -0.26502164581118676 0.45846014959035231 -0.54658005184793779
-v -0.3222061492904495 0.17143635308585375 0.22592037960302458
-v -0.24565553553640262 0.16230979537015086 0.39517760594289525
-v -0.18979491013400057 0.42818668985045988 -0.54167115880187933
-v -0.094171079485005887 0.16382112521010667 0.35749980156073818
-# v336...
-v -0.30279317607489142 0.14908273033673788 0.41047835610554989
-v -0.35099171066077289 0.16390313535646095 0.2792855534092204
-v -0.24233998247665428 0.21353098963594391 -0.01502543038560838
-v 0.44319454663327812 0.51749573923018111 -0.25081631688912037
-v 0.094581130216776957 -0.19014638218980429 0.31234735812515557
-# v341...
-v -0.2057986044082625 0.1740255305636077 0.06769937581539022
-v -0.2602064786466759 0.17165895205452933 0.076040979273131498
-v -0.19511385391182992 0.39431649940617614 -0.4829753254826607
-v -0.099759485172284848 0.1413269136386695 0.43382781634610934
-v -0.24883049977382934 0.44290165325344172 -0.51628316063765844
-# v346...
-v -0.29357289247764096 0.43103361350246977 -0.50350129354159712
-v -0.40805905678810106 -0.37110762798793839 0.18888694065650757
-v 0.028504383725680416 -0.047706473707756082 0.27479842683012645
-v 0.10083733281008289 -0.13422717811143473 0.15712558254704614
-v -0.16146626243622195 0.15420250661627877 0.059228899270520947
-# v351...
-v -0.48195019865323313 -0.27792067025918277 0.187820808753903
-v -0.16638687121747384 0.17470504320482821 0.35334071556706098
-v -0.41033190941563169 0.020514252323742922 0.14731951219012279
-v -0.22487182130321026 0.17525568275892059 0.12942958454971421
-v 0.084962511622948877 -0.17192841396397876 0.29214943065163601
-# v356...
-v -0.21889679635454731 0.12528807215882704 0.47871079787224241
-v 0.42559751237270593 0.51426219631678705 -0.20989325385837568
-v 0.40146309787418488 0.54191133137334513 -0.18553624039117894
-v -0.37517298810006772 0.13845655851627264 0.13850927932464327
-v -0.42870218219897199 -0.50611976035733464 0.11505437746734271
-# v361...
-v -0.43185371496601194 -0.020514252323742922 0.17318785549727544
-v -0.19029868674731906 0.18046918492000888 0.215774552925491
-v -0.43591907507814143 -0.052545072342654035 0.13226479246653078
-v -0.30073120668084308 0.18345669739434042 -0.17376192652175484
-v -0.48781978198515502 -0.26396722964377572 0.32222372289323969
-# v366...
-v -0.17584146951859336 0.36283631894135771 -0.44503977492624752
-v -0.20617350793445316 0.37182228783473897 -0.40854525979862955
-v -0.27945543156952551 0.45441822094860956 -0.56540723830382289
-v 0.33084064612802716 0.4979421771923016 -0.1614604045686252
-v -0.11837578839468774 0.17666157098213517 0.17856537795107214
-# v371...
-v 0.09949002326283532 -0.15101582664365856 0.2458371294319012
-v -0.43457176553089388 -0.53728361597192997 0.14147336032858784
-v -0.47070309286751472 -0.27697169570851282 0.40947080287891258
-v -0.24071149528476377 0.40134594052225009 -0.44272005935794312
-v -0.21091838068780319 0.14461903522803093 0.44528580536531009
-# v376...
-v -0.2493694235927284 0.051139184119439116 -0.1348891171498651
-v -0.39519517954568545 -0.41266334071912963 0.32139190569450421
-v -0.28718781679720695 -0.34799248245124803 -0.024960373829659762
-v -0.41005073177098877 0.12661195023568766 0.35166536543439664
-v -0.036365642040490004 0.1697492872179959 0.19627956956357881
-# v381...
-v -0.44367489177620983 0.032651753984163971 0.41082982816135361
-v 0.35905213647387119 0.52969181956656985 -0.1276487928003088
-v -0.22641829834874647 0.24162532262985351 -0.06549681759902036
-v -0.22707437951958007 0.35880610603480845 -0.33533363057471788
-v -0.034163083824120109 0.14335373582713762 0.31218333783244717
-# v386...
-v -0.44263219134399207 -0.48261799555926038 0.20572245212950502
-v -0.27990062950687683 0.35399093887029776 -0.33669265585715885
-v -0.47686556957927301 -0.26445929052190092 0.53123243874450943
-v -0.059633092134695184 0.1401787715897109 0.39564623535063353
-v -0.067096015452927246 0.16779275944068861 0.27489215271167411
-# v391...
-v -0.26442414331632036 0.38446356610847887 -0.39652491549014285
-v -0.17055767294634441 0.1708622820613741 0.13235851834807841
-v -0.34245093970474294 0.026629866094727322 0.030583926722519021
-v -0.4712068694808334 0.030519490178954972 0.25695536213049175
-v -0.41341314777151084 0.14137377657944339 0.23036064324134473
-# v396...
-v -0.16718354121062889 0.31517670817437515 -0.30950043447314557
-v -0.31256409922623446 0.3280288696815975 -0.34470621872948326
-v -0.24637019538320357 0.079561557698765176 0.53723089516355926
-v -0.33100466642073556 -0.4361065268412368 -0.029131175558530394
-v -0.29426412085405496 0.16820281017245967 0.14188341106035882
-# v401...
-v -0.2779206702591826 0.10128253074743405 0.50749635924256586
-v 0.30013370418597685 0.49190857356767148 -0.11012205295089739
-v -0.19267698099159089 0.33983833075660208 -0.32201283965975747
-v -0.0942413738961667 0.18150016961703314 0.14132105577107287
-v -0.45950285002257002 0.017491592643830968 0.35322355821512641
-# v406...
-v 0.058461518615349553 -0.088254633212310377 0.24639948472118711
-v 0.32137433209171407 0.50457328331179829 -0.086737445504757579
-v -0.39589812365729293 0.14829777607877648 0.28726396907596452
-v 0.044191753149719099 -0.090457191428680181 0.31650644411883272
-v -0.1406356852622557 0.26454130066825488 -0.25506912876434518
-# v411...
-v -0.17652098215981388 0.28156426390434774 -0.19365524488024452
-v -0.19876916329218836 0.31139252570688875 -0.23218829793152398
-v -0.24861961654034723 0.33879563032438431 -0.26795643747714765
-v 0.075683649349731069 -0.11126433713225949 0.17910430176997114
-v -0.010333278440628925 0.14480648699112608 0.19997002614951775
-# v416...
-v -0.22051356781124434 0.33189506229543819 -0.25777546359403369
-v -0.4890499341804681 -0.16202861772550795 0.20674172109133579
-v -0.42020827418371576 -0.40771930046749083 0.20839363975361316
-v -0.1237298793780975 0.15612388718800566 0.40979884346432938
-v 0.066615670309995531 -0.23444357695626444 0.37263653143068437
-# v421...
-v -0.44600632307970778 -0.012067207249260562 0.39189720008872742
-v -0.020912587320320447 0.14051852791032116 0.2384796477304103
-v 0.20928989349591262 0.43351734936348285 -0.047313996578775379
-v -0.2688878384250275 0.18455797650252517 0.018118384476680963
-v 0.056024645695110536 -0.092530876557922165 0.14366420280976425
-# v426...
-v -0.39168045898764847 0.14623580668472796 0.19677163044170401
-v -0.43609481110604331 -0.51202449089483693 0.29547669944657773
-v 0.15074636473420897 0.23385779019659167 -0.09626233821703796
-v -0.2970173186245173 -0.12092981866686128 -0.03298565243717768
-v -0.18016457580497902 -0.21032087819293696 -0.055843051799611937
-# v431...
-v -0.40206060036905117 -0.51216507971715841 0.3697075976323202
-v -0.33789351871448825 -0.503073669207036 0.44270834362274963
-v -0.42021998991890919 -0.45327007889965093 0.30650120626362065
-v -0.28341535006491397 -0.43583706493178731 0.4711190014668824
-v -0.0032452586485875331 0.2716293204602962 0.069011538157057392
-# v436...
-v -0.31996844386849926 -0.25853112851401172 0.64160638000206605
-v -0.28116592890777031 0.22295044073148321 -0.073779842380794339
-v -0.33403904183584082 -0.28161112684512163 0.61980339680704288
-v -0.36161788248123827 -0.22113450177649752 0.62686798512869735
-v -0.47683042237369261 -0.18576469722745145 0.52637040863922469
-# v441...
-v -0.40279869168623889 0.022177886721213829 0.5153927647629557
-v -0.44394435368565927 0.076913801545043889 0.37298800348648814
-v -0.40358364594420065 0.069919507634550321 0.45654462688622205
-v -0.37210346547938206 0.10388342396038147 0.44382133846612803
-v -0.43612995831162354 -0.24945143373908268 0.59400534791105097
-# v446...
-v -0.30642505398486314 0.38590460153727418 -0.43743626278569409
-v -0.32098771283033006 0.087059628222577554 0.51085877524308787
-v -0.41083568602895032 -0.099267424294159745 0.59661795685919183
-v -0.48170416821417061 -0.23315484608498421 0.53624677340730886
-v -0.44792770365143464 -0.13698037588189724 0.55256679253179419
-# v451...
-v -0.37682490676234515 -0.21647163916950177 0.004821025032107476
-v -0.35049964978264769 -0.12440939201931818 0.65912140411628395
-v -0.3170277943349416 0.39452738263965825 -0.49752626859293403
-v -0.35955591308718976 0.05151408764562946 0.52417956615804828
-v -0.4638728192497294 -0.2099459746667463 0.56536037536304906
-# v456...
-v 0.063991345626661172 0.32166722547155058 0.057155214141279088
-v -0.42517574590574153 0.032499449426649209 0.46686618959165754
-v -0.41535795981362467 -0.030671794736470064 0.54429548348521373
-v -0.37801991175207783 -0.17725907347700176 0.63946240046166347
-v -0.43378681127293228 -0.28698864929891832 0.5803330849402869
-# v461...
-v -0.37894545483236086 -0.087001049546610532 0.62392733559513969
-v -0.28662546150792112 0.26796229534474447 -0.16260854661758395
-v -0.37796133307611046 -0.44325312530924543 0.37700650065784375
-v -0.43013150189257365 -0.16184116596241244 0.58909645486499262
-v -0.32322541825228024 -0.40468492505238557 0.42402174598918602
-# v466...
-v -0.44018360268855961 -0.026090942275828418 0.48972358895409179
-v 0.35290137549730632 0.45733543901178031 -0.20609735565569565
-v -0.10480896704066475 0.17502136805505153 0.099296713632143291
-v -0.40830508722716358 -0.22325504984651323 0.61570288948933294
-v -0.26414296567167744 0.10703495672742158 -0.33352940735492553
-# v471...
-v -0.37840653101346178 -0.017128404852834091 0.57448693307875198
-v -0.40555188945670123 -0.15681511556441963 0.61748368123873854
-v -0.29155778602436649 0.19473895038563924 -0.057330950169180953
-v -0.38208527186420732 -0.13111079254997535 0.63997789281017559
-v -0.35341686784581844 -0.45772205827316459 0.41100556418925549
-# v476...
-v -0.40671174724085346 -0.46479836233001243 0.34626441151021303
-v -0.34452462483398477 -0.019975328504844021 0.60336622033062293
-v -0.43140851702866045 0.10808937289483245 0.35364532468209087
-v -0.37537215559835652 -0.23683358693572976 0.62466542691232751
-v 0.43209974540507445 0.39627302718348345 -0.25577207287595261
-# v481...
-v -0.2606985395248011 -0.24103953587018073 -0.043857854696705612
-v -0.43146709570462777 -0.317754169916936 0.11674144333520048
-v -0.30647191692563702 0.34605938614432769 -0.45663835276776976
-v 0.090738369073323097 0.33757719386426494 -0.037039296814113741
-v -0.30518318605435674 0.42689795897917959 -0.53985521984689355
-# v486...
-v -0.28238436536788974 0.21747919239613892 -0.26672628528183473
-v -0.24327724129213096 0.13034926976240055 -0.43819778557326872
-v -0.44545568352561526 -0.14321314700481633 0.10178044949315612
-v -0.29815374493828262 0.15175391796084611 0.021609673564331099
-v -0.2177252228352016 0.32903642290823482 -0.55102031548625785
-# v491...
-v 0.040630169650908238 -0.18523748914374585 -0.049985184202883538
-v -0.25597709824183801 0.16276670904269547 -0.30229525732916962
-v -0.33422649359893614 0.11311542329282556 0.055608737095742787
-v -0.36987747579262531 -0.44621720631319006 0.0099408013116481057
-v -0.2798889137716834 0.13204805136545186 -0.12011557507091607
-# v496...
-v -0.46237320514496688 0.095084906830095378 0.30049103410937722
-v 0.14079970555496407 0.3880017181369031 -0.040225976786734001
-v -0.44640465807628521 -0.027203937119206954 0.44851934827870416
-v -0.48108323424891747 -0.12364786923174338 0.343569792415718
-v -0.47733419898701129 -0.1537104457381534 0.39708727077942874
-# v501...
-v -0.45295375404942761 -0.28312245668507763 0.11500751452656886
-v -0.23649383061511933 0.063651589306050832 -0.2041642593487753
-v -0.070095243662452178 0.21129328421399371 0.09728160717886869
-v -0.34468864512669317 -0.36874104947885999 0.024866647948112094
-v -0.30592127737154445 0.18556552972916249 -0.14594877117248833
-# v506...
-v -0.32028476871872258 0.14912959327751177 0.095243069255207216
-v -0.25733612352427904 0.32778283924253498 -0.47625049348161647
-v -0.32326056545786064 0.31193144952578766 -0.36745817647517648
-v -0.18916226043355375 0.28814850708307055 -0.60130425093657458
-v 0.22013866428505369 0.43181856776043154 -0.087698135790621037
-# v511...
-v -0.43743040491809726 0.12832244757393244 0.28385469013466857
-v -0.30009855698039645 0.38715818520297401 -0.5122880949366897
-v -0.31679347963107235 0.27490972631446414 -0.32434427096325535
-v -0.41594374657329741 -0.11893814368397358 0.059205467800134033
-v -0.45071604862747744 -0.09325725213991623 0.11790130111935271
-# v516...
-v -0.47677184369772524 -0.10294616514490529 0.22930622707393361
-v 0.033952200590637839 0.28099019287986843 -0.010749187039996642
-v -0.41306167571570707 -0.026172952422182698 0.10192103831547759
-v -0.48564065523917216 -0.11502508812935899 0.28188644662216783
-v -0.46563017952874791 -0.08929733364452809 0.33777050349495685
-# v521...
-v -0.45344581492755281 -0.058356076998608578 0.214286654555922
-v -0.11752053972556535 0.35273735520459792 -0.67409411369352179
-v -0.17025306383131456 0.29098371499988701 -0.63853685738138044
-v 0.31630141875294726 0.46063927633633517 -0.17087985566416447
-v 0.41480732025953221 0.49495466471797039 -0.25652187992833386
-# v526...
-v -0.44060536915552417 -0.049627854279483297 0.35257919277948629
-v -0.45502743917866945 -0.096256480349441259 0.41268091432191978
-v -0.45992461648953442 -0.025645744338476939 0.28943138008675406
-v -0.50026189276060629 -0.17089742926695484 0.30862175433363626
-v -0.45455880977093122 -0.11180326095115839 0.49534714184695111
-# v531...
-v -0.16369225212297869 0.20891498996972188 -0.60287415945249778
-v -0.30310950092511496 0.25615283426973989 -0.19463936663649489
-v 0.034655144702245302 0.30637819104408942 0.018926770205029485
-v -0.29740393788590147 0.14964508562602405 -0.05784644251769306
-v -0.18994721469151549 0.19456321435773721 -0.58391809990948473
-# v536...
-v -0.04611313372144607 0.23151464315790024 0.064641568929898002
-v -0.17696618009716519 0.23042507978490864 -0.6174368182979646
-v -0.31236493172794583 0.23420926225239541 -0.2326569273392623
-v -0.19735155933378012 0.22331362852248041 -0.58657757179839942
-v -0.22651202423029421 -0.28849997913887432 -0.044689671895441048
-# v541...
-v -0.21373015713423274 0.21843988268200237 -0.53044748448654766
-v -0.31822279932467423 0.3795663887976139 -0.45197549016077398
-v -0.37108419651755126 0.11692303723069894 0.097879109673735004
-v -0.42060660918029336 -0.081916420472650076 0.076603334562417413
-v -0.25429003237398035 0.13557448765868232 -0.36977789204348088
-# v546...
-v -0.2696142140070219 0.36841300889344319 -0.50857420688036392
-v -0.27466369587540163 0.15625276027513346 -0.17377364225694833
-v -0.46884029097175506 -0.10284072352816406 0.17315270829169507
-v -0.25939809291832738 0.083404318842218952 -0.18855890007109083
-v -0.46595822011416471 0.090738369073323097 0.23913572890124388
-# v551...
-v -0.46056898192517454 0.064612279591914276 0.22201903978360346
-v -0.19923779269992661 0.40289241756778665 -0.62147874693970728
-v -0.4530240484605883 0.10236037838523218 0.20123532555041104
-v -0.26993053885724522 0.12768979787348581 -0.28711166451844961
-v -0.44464729779726675 0.037314616591159894 0.19482681839959018
-# v556...
-v -0.30285175475085879 0.068220726031499007 -0.0024895937286095846
-v -0.2502246722618508 0.20630238102158099 -0.35109129440991727
-v -0.28707065944527244 0.18616303222402875 -0.2024303305401437
-v -0.45075119583305767 0.11823519957236611 0.2330786938062267
-v -0.22985100876042933 0.26489277272405859 -0.48291674680669344
-# v561...
-v -0.23212386138795996 0.19366110274784112 -0.44568414036188764
-v -0.25786333160798464 0.23978595220448057 -0.36490414620300288
-v -0.12677597052839623 0.40661802135930575 -0.6718329768011847
-v -0.31680519536626583 -0.0028117764464298477 -0.0054068117917803341
-v -0.46421257557033968 0.0082361618409999265 0.23215315072594364
-# v566...
-v -0.27064519870404596 0.038005844967573893 -0.035246789329514853
-v -0.37384911002320709 -0.079760725197054141 0.028756272032339759
-v -0.28430574593961666 0.12423365599141616 -0.18439981407741363
-v -0.27398418323418128 0.14045994923435381 -0.17872939824378056
-v -0.43404455744718828 0.062304279758803247 0.16424874954466789
-# v571...
-v -0.39917852951146088 0.074793253475028354 0.12582113811012952
-v -0.42145014211422227 0.11568116930019258 0.16745886098767507
-v -0.27030544238343573 0.076585760959627089 -0.11751468185796865
-v -0.46806705244898694 0.054958513792505957 0.30951215020833905
-v -0.50192552715807714 -0.22145082662672086 0.25827924020735232
-# v576...
-v -0.4470724549823123 -0.012043775778873625 0.20990496959356916
-v -0.29988767374691416 0.12619018376872346 -0.016876516546174558
-v 0.0048854615756715025 0.26946190944950682 0.017309998748332445
-v -0.40893773692761037 -0.15308951177290023 0.031111134806224582
-v -0.21167990347537785 0.16597682048570261 -0.53948031632070292
-# v581...
-v -0.36546064362469205 0.014386922817565055 0.063200533501102815
-v -0.2469676978780698 0.034444261468763032 -0.080200065266808673
-v -0.30623760222176777 0.2972164861228061 -0.38234887590606004
-v -0.22867943524108361 0.1643483332938121 -0.48781392411755836
-v -0.47793170148187752 -0.18161732696896782 0.15582513594057246
-# v586...
-v 0.3848853325754435 0.54073975785399964 -0.18871120462860574
-v 0.39566380895342373 0.52699720047207466 -0.22151526317028486
-v 0.42278573592627633 0.52996128147601929 -0.24198265255325391
-v 0.44892354114287841 0.50648294814833172 -0.27388459948503679
-v -0.13565649780503661 0.15831472966918197 0.083351598033848548
-# v591...
-v 0.47379604695858735 0.48364898025628428 -0.28001192899121474
-v -0.063944482685887302 0.19537160008608589 0.055573589890162423
-v -0.083884663985150834 0.12456169657683294 0.04081176354640683
-v 0.46120163162562117 0.4746044326869357 -0.29195026315334727
-v -0.11218988021254253 0.14423241596664679 0.060236452497158234
-# v596...
-v 0.44340542986676029 0.44995452583990259 -0.28099605074746514
-v -0.12249972718278451 0.11176811374557799 0.029424068938366799
-v -0.092894064348919114 0.078483710060967035 0.026389693523261482
-v -0.10211434794616966 0.031046698262660408 0.0041063651853066067
-v -0.19445777274099632 0.46066270780672214 -0.64055196383465496
-# v601...
-v -0.054794493499797557 0.007626943610940214 0.015681511556441947
-v -0.10062644957660062 -0.23814574927739693 -0.061361163075730106
-v -0.019459836156331813 -0.047003529596148945 0.029096028352950009
-v 0.049768443101804595 -0.11934819441574465 0.068332025515836892
-v -0.033389845301351917 -0.078401699914613085 0.0017515024114217884
-# v606...
-v 0.011704019458263363 -0.086391831316550496 0.035785713148413847
-v -0.19038069689367335 0.47036333654690432 -0.63322962933874449
-v 0.029945419154475666 -0.12811156434045035 0.033020799642758045
-v -0.024040688616973376 -0.1917397221761144 -0.037554789162625848
-v -0.15826786672840812 0.4598426063431803 -0.65159990212208474
-# v611...
-v -0.0068654208233656531 -0.13406315781872649 0.00026360404185276774
-v 0.072684421140206124 -0.13855028439782041 0.067055010379750105
-v -0.13453178722646458 0.43780530844428778 -0.65903939396992983
-v 0.0087282227191253624 -0.15905282098636986 -0.0079256948583735498
-v 0.059504219047567197 -0.15817414084686068 -0.0086989333811417005
-# v616...
-v 0.28048641626654974 0.34042411751627483 -0.16435419116140901
-v 0.32900127570265442 0.32225301223122332 -0.17200456624273633
-v -0.15954488186449506 -0.0046394311366089883 -0.041514707658014252
-v 0.20992254319635936 0.18949030101897055 -0.080645263204160031
-v -0.38906785003950761 -0.35097999492557941 0.51115166862292438
-# v621...
-v -0.36282460320616422 -0.15331211074157614 -0.0063089234016765073
-v 0.10214949515174999 0.25143139298677691 -0.072596553126255195
-v -0.16467637387922907 0.42078234520819524 -0.6603398405764036
-v 0.20370148780863373 0.39466797146197985 -0.10745086532678924
-v 0.014012019291374389 0.17246733778287768 -0.01231909555591985
-# v626...
-v -0.1118384081567388 -0.080592542395789432 -0.036125469469024112
-v -0.11180326095115847 0.32331914413382767 -0.64495708026739473
-v -0.19222006731904612 -0.30232454666715336 -0.062907640121266414
-v -0.22857399362434258 0.12735004155287552 -0.47492661540475595
-v -0.058977010963861598 -0.18672538751331491 -0.035703703002059668
-# v631...
-v -0.32452586485875395 -0.23650554635031296 -0.017954364183972588
-v -0.32566229117251927 -0.17730593641777562 -0.023156150609867417
-v -0.062772909166541671 -0.079128075496607483 -0.017403724629880116
-v 0.078307974033065414 0.19587537669940439 -0.053089854029149591
-v 0.017116689117640381 0.10820653024676713 0.0058520097291316761
-# v636...
-v -0.02876212989993648 0.04974501163141766 0.035527966974157804
-v 0.28615683210018283 0.38171036833801669 -0.16867729744779458
-v -0.1584201712859232 -0.072871872903301466 -0.046259580411364264
-v -0.28458692358425958 0.019975328504843695 -0.019535988435089257
-v 0.1669023635659859 0.2782487108445994 -0.11112960617753469
-# v641...
-v 0.37161140460125686 0.28532501490144724 -0.15778166371787974
-v -0.14507594890057587 -0.15229284177974534 -0.05163710286516094
-v 0.069064258965427935 0.16317675977446655 -0.036969002402953005
-v -0.063897619745113501 0.027860018290040218 0.022277470470358138
-v -0.34108019868710843 -0.11179154521596492 -0.0034971469552468729
-# v646...
-v -0.058648970378444805 -0.14330687288636376 -0.024128556630924329
-v -0.18572955002187105 -0.25591851956587081 -0.053757650935176628
-v -0.19913235108318555 -0.016952668824932064 -0.042920595881229075
-v 0.48378956907860593 0.44774025188833932 -0.29755038457581962
-v -0.27807297481669774 -0.16331734859678818 -0.045486341888596113
-# v651...
-v -0.41968106610001016 -0.33106324509670293 0.54115566645336732
-v -0.14893042577922311 0.23090542492784052 -0.61975653386626917
-v 0.32433841309565864 0.24490572848402145 -0.12140430594219631
-v -0.28654345136156684 -0.27649135056558111 -0.028311074094988412
-v 0.14500565448941505 0.19270041246197767 -0.075443476778265212
-# v656...
-v -0.13931180718539504 0.3645116690740221 -0.67096601239686893
-v -0.22326676558170669 -0.12644792994297943 -0.054144270196560706
-v -0.33039544819067584 -0.054735914823830376 -7.6152278757474364e-005
-v 0.24085208410708531 0.29999311536365525 -0.14175453797323079
-v -0.42823355279123371 -0.34427859439492225 0.26544927014574793
-# v661...
-v -0.24014913999547793 -0.34751213730831632 0.57995818141409627
-v 0.21296863434665808 0.34119735603904278 -0.13247567570001301
-v 0.067787243829341162 0.26556056963008567 -0.047290565108388458
-v -0.2326393537364721 -0.18807269706056248 -0.052164310948866491
-v 0.3558654565012509 0.40042039744196706 -0.20895599504289913
-# v666...
-v -0.34758243171947695 -0.33612444270027625 0.038175723127879042
-v -0.20312741678415444 -0.35755252236910878 0.50549296852448466
-v -0.42451966473490793 -0.33890107194112556 0.48368998532946161
-v -0.38431126155096407 -0.31469636303144377 0.59345470835695846
-v -0.2607688339359619 -0.37238464312402514 0.50797670438549758
-# v671...
-v -0.3439388380743118 -0.36399617672550993 0.49266423848764951
-v -0.44853692188149435 -0.31479008891299137 0.43332403973279071
-v -0.31529386552631 -0.36146557792372336 0.54665034625909847
-v -0.28452834490829237 -0.38418238846383607 0.48351424930155973
-v -0.25273183959325046 0.090574348780614544 -0.28828323803779526
-# v676...
-v -0.44831432291281864 -0.30179733858344776 0.54962614299823653
-v -0.2055994369099737 -0.33613615843546973 0.57947783627116456
-v -0.23752481531214359 0.092226267442891974 -0.35730063406244944
-v -0.46454061615575648 -0.2911594510277889 0.3379696709932456
-v -0.43687976536400491 -0.31807049476715932 0.32822217931228953
-# v681...
-v -0.23156150609867412 -0.32203041326254778 0.62780524394417392
-v -0.30075463815123005 -0.39343781926666699 0.45550192645400445
-v -0.27367957411915139 -0.30638990677928291 0.64339888748666496
-v -0.33894793488189928 -0.31821108358948075 0.59497775393210783
-v -0.43864884137821686 -0.30732716559475937 0.38178652061677415
-# v686...
-v -0.36521461318562953 -0.28411829417652146 0.61695647315503288
-v -0.39472655013794722 -0.33663993504878842 0.40487823468307754
-v -0.39958858024323179 -0.34472379233227357 0.4496089116516957
-v -0.33275031096456059 -0.36991262299820571 0.4482616021044481
-v -0.19992902107634061 0.10757388054632047 -0.42070619292943773
-# v691...
-v -0.39409390043750053 -0.27734659923470334 0.61250449378151928
-v -0.27680767541580426 -0.34207603617855226 0.59572756098448909
-v -0.16104449596925738 0.17788000744225493 -0.53569613385321646
-v -0.17491592643831033 0.093421272432624797 -0.32145048437047158
-v -0.12369473217251709 0.27112554384697768 -0.63551419770146855
-# v696...
-v -0.13750758396560267 0.13726155352654015 -0.32898370209986427
-v 0.091171851275480942 0.081928136207843533 0.02341389678412345
-v -0.16588309460415518 0.057114209068101891 -0.17378535799214173
-v -0.17779799729590065 0.15051205003033974 -0.52668673348944817
-v 0.48098950836736981 0.30392960238865674 -0.20624966021321062
-# v701...
-v -0.13129824431307052 0.27220339148477585 -0.64737052171724685
-v -0.22113450177649752 0.0064553700915946609 -0.050582686697749825
-v -0.11706362605302056 -0.0042762433456117891 -0.024972089564853219
-v 0.46963696096491009 0.3686356078621188 -0.26598819396464696
-v -0.14284995921381896 0.29323313615703073 -0.65564183076382732
-# v706...
-v 0.27319922897621962 0.19729298065781278 -0.080340654089130159
-v 0.3874042156420367 0.22184916162329846 -0.082344044807211261
-v -0.17764569273838574 0.13621885309432244 -0.48180375196331504
-v 0.019237237187656072 0.069919507634550321 0.026717734108678275
-v 0.23534568856616064 0.16242695272208521 -0.041456128982046973
-# v711...
-v -0.18639734692789794 0.16795677973339684 -0.55594092426750985
-v 0.47602203664534409 0.41886096463646832 -0.29411767416413676
-v -0.24071149528476377 0.10444577924966764 -0.41150934080257412
-v -0.14870782681054737 0.094159363749812333 -0.25491682420683026
-v -0.13495355369342912 0.031351307377690263 -0.039241855030483629
-# v716...
-v -0.017632181466152509 0.0021674110107894034 0.042967458822002882
-v 0.14374035508852176 0.13251668077318995 -0.029037449676982737
-v -0.15533893293004392 0.13314933047363661 -0.37542487640672711
-v -0.15068778605824162 0.2062320866104205 -0.58712821135249182
-v -0.17151836323220787 0.016894090148964723 -0.061337731605343192
-# v721...
-v -0.18994721469151549 0.06222226961244897 -0.22484253196522658
-v -0.15457741014246926 0.15652222218458292 -0.42555650729952887
-v 0.31951153019595441 0.18904510308161906 -0.043459519700128089
-v 0.41959905595365604 0.26222158509995042 -0.14358219266341005
-v -0.22669947599338955 0.03872050481437482 -0.12613746296035286
-# v726...
-v 0.084306430452115291 0.12180849880637044 -0.01809495300629407
-v -0.13307903606247595 0.07271956834578637 -0.10494369799538947
-v -0.14313113685846204 0.041567428466384747 -0.084991800960932506
-v -0.19538331582127938 0.037115449092871254 -0.1270278588350556
-v 0.014843836490109761 0.030753804882824018 0.066270056121788504
-# v731...
-v 0.26948534091989379 0.2500606519691424 -0.12470814326675114
-v -0.16721868841620913 0.033389845301351841 -0.098921810105952676
-v -0.0543727270328331 -0.035112058374790089 0.000872822271912522
-v -0.20302197516741322 0.076058552875921656 -0.28818951215624761
-v -0.11044423566871743 0.34303672646441574 -0.66425289613101812
-# v736...
-v 0.44101541988729515 0.31785961153367687 -0.20801873622742259
-v -0.20941876658304071 0.12274575762184695 -0.47328641247767195
-# vt1...
-vt -0.00023951795687859184 5.8335221891247309e-005
-vt 4.1601396668346224e-005 -0.00022706936084880954
-vt 4.0631905796666146e-005 -0.00022812956129596851
-vt 3.7377459451412576e-005 -0.00022490886074076583
-vt 0.0038581630417712856 0.0017031512417283617
-# vt6...
-vt 4.2526018383899633e-005 -0.00022146877831479131
-vt 0.00032682257318227687 -8.3729538009025132e-005
-vt 0.00035593725093918671 -5.980774055601288e-005
-vt -0.0012441938845144801 -0.00017296000535821474
-vt 3.5081181617484247e-005 -0.00022367068675874436
-# vt11...
-vt -1.6343837737756162e-005 -0.00021368790724062367
-vt 3.9252802478684234e-005 -0.00022958150255699387
-vt 1.2173173270416116e-005 -0.00017712306460576351
-vt 4.7094631516905738e-005 -0.00022418720525209406
-vt 3.4234914977220032e-005 -0.00022436372387064435
-# vt16...
-vt 0.00032593581103399633 -6.952164687784346e-005
-vt 4.0527938527705476e-005 -0.00022631070685506333
-vt -0.00072398704351816362 -4.902823738785634e-005
-vt 0.00034307723861801143 -7.1364715333053239e-005
-vt 0.0012306625643918115 0.00061568012902093636
-# vt21...
-vt 3.1196887116120842e-005 -0.00022166989140479267
-vt 0.00026250851082369048 -0.00010793884801117996
-vt -0.00090241414027782824 -0.00010996062762677101
-vt 0.00042624517117521854 -4.8995527000451769e-006
-vt 0.0017029897791902213 0.00076579756600862173
-# vt26...
-vt 3.3899613321321242e-005 -0.00021930440161105493
-vt -0.00093199595514076999 -4.3211510583261465e-005
-vt -0.00080015530703544252 -1.8603829158843105e-005
-vt -0.00038652080439104813 -0.00016602202293516634
-vt -0.00044015790612909889 -0.00011568440898728849
-# vt31...
-vt 0.00030789108144940736 -6.4917151584078137e-005
-vt -0.00044214322080111251 -0.00049317485144645336
-vt -0.00098967042921153936 -2.4766659419337995e-005
-vt 3.9955026121002435e-005 -0.00022581180093752032
-vt -0.00036254522567277098 -0.00012030928087099077
-# vt36...
-vt 0.00035997919215136065 -6.2006429824538675e-005
-vt -0.0012288374241739078 0.00020992021127004296
-vt -0.00015677625255423877 1.429345061926897e-005
-vt 3.7345897400301031e-005 -0.00023065590499902225
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-# vt41...
-vt 3.8870961934167614e-005 -0.00022526058002445118
-vt 0.00035954294221884203 -5.8643747436575673e-005
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-vt -0.00016919863100911536 5.7468797274011648e-005
-vt 0.00080918188363179183 -0.00044673708801256973
-# vt46...
-vt -0.010816877451517642 -0.00029705724288865633
-vt -0.0011084564106539421 -0.00012664130803462887
-vt -0.0005874600062912641 -5.2464742849344216e-005
-vt 9.152929155117201e-005 -0.00020159457271441895
-vt 1.7555682772438241e-005 -0.00021612646293102779
-# vt51...
-vt -0.0025304986619688156 0.00066118126098907123
-vt 0.00034253110146474641 -5.5155771409733058e-005
-vt 4.3381304942122223e-006 0.00068500561806686107
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-# vt56...
-vt -0.00079503586981792551 -7.4183439486128497e-005
-vt 3.9697995905384198e-005 -0.00022491397782639861
-vt 0.00035483195888624808 -6.0637633322457244e-005
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-# vt61...
-vt -8.1986491536234496e-005 0.0010303810540251272
-vt -0.0010481418158971925 -6.4254779217948004e-005
-vt 3.9182031053394684e-005 -0.00023128516905623084
-vt 0.0022076376265718553 0.00053061673538449736
-vt -0.0013742224414700355 0.0017517213850169345
-# vt66...
-vt 0.012569753190218157 -0.0005469520907606096
-vt -0.0010099642658320529 -8.921882856093255e-005
-vt -0.0008635447877781352 -5.5480952302859512e-005
-vt -0.00018162037915789991 -0.00013395331849061661
-vt 0.0097659531183829362 0.031418241233783943
-# vt71...
-vt 0.0044743550625234163 0.00083678463062088909
-vt -0.0011722053269538138 -0.00018264326636482567
-vt 4.0461088897165987e-005 -0.00022453209531926447
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-vt -0.00084886709059461829 -0.00054695209075425444
-# vt76...
-vt -5.2425551245668944e-005 -0.00016641227750064411
-vt 4.0585810117163557e-005 -0.00022610548842515388
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-vt 0.0023797352468751531 0.0011587663699560895
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-# vt81...
-vt 0.00027756495663686098 -7.9997496680166234e-005
-vt 4.7856627214404313e-006 -1.267140397329385e-005
-vt 0.00023898115427142125 -6.9188258102003504e-005
-vt 4.1153770469794237e-005 -0.00022746546555374458
-vt -0.00013390465057341872 -2.3337357467059436e-005
-# vt86...
-vt 0.00021990373584031969 -0.00011377865714726145
-vt -0.00069247969714589241 -1.9473496705626602e-005
-vt -0.00011381952978774257 -0.00018948307372026693
-vt -0.00035564290227198952 0.0007022895917051748
-vt 0.00033884444372012101 -6.3758127413261767e-005
-# vt91...
-vt -0.0019281523175725887 0.0007804861592481052
-vt 0.00034382170420605568 -5.9863494234945781e-005
-vt -0.0011689650116942715 -0.00014809658365866194
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-vt 0.0024065889837103088 -0.00054695209075572256
-# vt96...
-vt 0.00031962987980860974 -7.896452363037685e-005
-vt -0.00035276198865479697 2.0709966725925163e-005
-vt -0.0028374457803665674 -0.00054695209075395531
-vt -0.0022630613075278784 -0.00054695209075400291
-vt 9.861859538877471e-006 -0.00020411497425495891
-# vt101...
-vt -0.0010305400049597235 -0.00054695209075420175
-vt -0.0018060270868755363 -0.00047832084704238444
-vt -0.0017897432050997045 -0.00054695209075406861
-vt -0.0014982626492334797 -0.00054695209075410873
-vt 1.6945421448026632e-005 -0.00022301417811682961
-# vt106...
-vt 0.00031004353059556344 -0.00010861356878657288
-vt -0.001218422875894222 -0.0005469520907541625
-vt 0.00075026203678578429 -4.8102052615340749e-005
-vt 4.2000510307428629e-005 -0.00022732729824522375
-vt 0.000158952216383762 -0.00021316592695465444
-# vt111...
-vt -0.00092361832959261814 -0.00051907088451772366
-vt -0.00048100422951169453 -0.00014323812427664931
-vt 4.0504361167571779e-005 -0.00023347891452938767
-vt -0.00042400169885561945 -0.00022412706528563954
-vt -0.00050293666215639465 -0.00036899185558257456
-# vt116...
-vt 3.9737316578254689e-005 -0.00022777488068900662
-vt -0.0009299441459173774 -0.00037519675725965733
-vt -0.0008725049304434615 -0.00041677283344410392
-vt 9.4464429299181973e-006 -0.00023171000200878955
-vt 4.7266005545928969e-005 -0.00022753001592383293
-# vt121...
-vt -0.0010425784769505994 -0.00020915937182788738
-vt -2.7562637505001986e-006 -0.00023010886399627115
-vt 3.8292231859901604e-005 -0.00022644378004144447
-vt 3.012186342050277e-005 -0.00023634409622156933
-vt -0.00086020910304634296 -0.00031145054721833652
-# vt126...
-vt 2.3705945297110287e-005 -0.00023355744378168112
-vt 2.7959971283741947e-005 -0.00022815148358559887
-vt 4.0856500898710235e-005 -0.00022669349009114088
-vt 4.0538365652674491e-005 -0.00022654133181109935
-vt -1.5722961968500648e-005 -0.00025476087919147443
-# vt131...
-vt -0.0012907579204154973 -0.00026197179163684798
-vt 4.047581526928079e-005 -0.00022856176523571416
-vt 0.00035866954998760997 -6.4289776128564013e-005
-vt 1.390713342266231e-005 -0.00025136542749480445
-vt 3.3112152159169017e-005 -0.00022735033378682736
-# vt136...
-vt 2.9558658976511221e-005 -0.00024767605801713976
-vt -0.00062112956963307486 -0.0004882638075512126
-vt 3.496937284330065e-005 -0.0002297484672355726
-vt -0.00056374159768714238 -0.00010422852670530247
-vt -0.00034021202516070631 -0.00019736257579855464
-# vt141...
-vt 7.1088475951941454e-006 -0.0002362535231073218
-vt -0.0010600415549129258 -0.00018159064144557176
-vt 4.1062027892134478e-005 -0.00022691189223489837
-vt -0.001050745020001416 -0.00039265292567817567
-vt 3.6378548497952023e-005 -0.0002305783512675701
-# vt146...
-vt -0.000625690157370698 -0.00042154257335835532
-vt -0.001051771996803591 -0.00025279586189954934
-vt -0.00062358139882776054 -0.00016557144738988197
-vt -8.0765230779385189e-005 -0.00026352593717354761
-vt -0.00079202673691615433 -0.00013135392023568129
-# vt151...
-vt -0.00085277065938109409 -0.00035607786200508959
-vt -0.00054442903946478466 -0.00026302217791216115
-vt -0.00095097136830774726 -0.00023805241049249036
-vt -0.0010953389515878514 -0.00050913921466646703
-vt 3.7694462268741957e-005 -0.00022693870655874303
-# vt156...
-vt 2.6175300817159186e-005 -0.00023036878742689767
-vt -0.00054673983141535071 -0.00029552615114811453
-vt -0.00062320641043914216 -0.00012738046664539227
-vt 4.0001565131973782e-005 -0.00022683330255282986
-vt 4.0584089251276267e-005 -0.00022786575692455754
-# vt161...
-vt 4.0818305272395661e-005 -0.00022705159207064298
-vt -0.00064770922109547158 -0.00024258563246560817
-vt 3.060520452295018e-005 -0.00023183140524588627
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-vt 1.8180846418747176e-005 -0.00022850051187259745
-# vt166...
-vt 4.0049081371243411e-005 -0.00022840167137695971
-vt 3.9775258958582582e-005 -0.00022883684861723952
-vt 3.2266822351662006e-005 -0.00023243297877267714
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-# vt171...
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-vt -0.00048681582933290252 -0.00017680133473429272
-vt -0.00061873852636047666 -0.00022548772184790189
-vt 4.0654363084501044e-005 -0.00022731271856215636
-vt 2.573454859750024e-005 0.0013061295164239202
-# vt176...
-vt -0.0013952970724176589 -0.00049060871689736896
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-vt -0.00074273036992168751 -0.00035050553198945317
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-vt 4.085370776608227e-005 -0.00022775417894569197
-# vt181...
-vt 3.5791366603178665e-005 -0.00022822991260791967
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-vt 0.00038103697876458453 4.6065106144413219e-005
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-vt -0.00021956165670133226 -0.00026776833842295827
-# vt186...
-vt 4.0130866902715612e-005 -0.00022959509005397575
-vt -0.0001757445868838664 0.00031078554807147964
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-vt 2.0713100336272605e-005 -0.00023696296662183277
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-# vt191...
-vt -0.0008100591038968652 -0.0002501597631194574
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-vt -0.00041980200926047817 -0.00026613301753592496
-vt -0.00052156930624486925 -0.00044016179879400902
-vt 4.0879593925596813e-005 -0.00022748088104803787
-# vt196...
-vt 3.2512529035723381e-005 -0.00022594015530822266
-vt 6.3768073059466968e-007 -0.00022224954981640485
-vt -5.141215591933368e-007 -0.0002738368700362457
-vt -0.00070957477243807632 -0.00022110900140768976
-vt -0.00074761478549715404 -0.00027278136791326392
-# vt201...
-vt -0.00072114731484852757 -0.000515229985231347
-vt -0.00072773551810396964 -0.00046114834470049805
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-vt 0.00034208354311870276 -7.9345030081642127e-005
-# vt206...
-vt -0.0012541692484552905 -0.00037261616931992623
-vt -0.00081254037509503885 -0.00050598822107100327
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-# vt211...
-vt 3.9409457898376132e-005 -0.0002282567031117319
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-vt -0.0013576868574606618 -0.00010692164865394957
-# vt216...
-vt -0.0004786108129576222 -0.00032652027515551606
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-vt 3.9838868756865431e-005 -0.00022716159908594733
-# vt221...
-vt -0.00077019480321491307 -0.00042439404198822846
-vt 3.5998119319494148e-005 -0.00022755425490744935
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-vt 4.1017476997057267e-005 -0.00022721549822092351
-vt 3.9042768954840323e-005 -0.00022741208461431368
-# vt226...
-vt -4.869102946911813e-005 -0.00029453861324354259
-vt 3.7992606362134695e-005 -0.00022961721656281894
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-vt -0.00071694927285134019 0.00052387023416047569
-# vt231...
-vt 0.00035759503731271763 -4.2031694087658542e-005
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-# vt236...
-vt -7.0450609836590627e-005 -0.00023207551437067842
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-vt -0.0013139442825415432 0.00024530290577779031
-# vt241...
-vt 0.0012537420783728659 0.0017170737343235789
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-# vt246...
-vt 0.00036206151917524826 -6.9692010285028955e-005
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-vt 4.0897815729065701e-005 -0.0002281499297057382
-# vt251...
-vt -3.9142873429327818e-005 -0.00040686230843878669
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-# vt256...
-vt 0.00032578080495709871 -0.00013637321194982273
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-# vt261...
-vt -0.00039316315832019222 -0.00034816850076226633
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-# vt266...
-vt 0.0003608964403737161 -6.4638945165188086e-005
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-# vt271...
-vt 0.00099585221808649871 0.0022198782691397034
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-# vt276...
-vt 0.00035295635717914192 -7.0088455361433345e-005
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-# vt281...
-vt 0.0013541711785355001 0.00047421647222043427
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-# vt286...
-vt -0.00022020185284382654 -0.00033341706036658177
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-# vt291...
-vt 0.0013913164279215906 0.00091430591882010694
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-# vt296...
-vt 1.982855841394654e-005 -0.00029552400048476763
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-# vt301...
-vt 0.0069555800185242753 0.0040760318519018918
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-# vt306...
-vt -0.00015775389937618817 -0.0002962107118938429
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-# vt311...
-vt 0.00035824276608183853 -6.6564374381551227e-005
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-# vt316...
-vt 0.0067943848846313826 -0.00054695209075762273
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-# vt321...
-vt 3.7278864943465773e-005 -0.00026442343459808626
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-# vt326...
-vt 0.0003600470659722993 -6.3032519257989717e-005
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-vt 3.7940918805295931e-005 -0.00022378916899052032
-# vt331...
-vt 0.00035997746583781715 -6.2907154482938499e-005
-vt 1.6131105631402021e-005 4.3080252432926153e-005
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-# vt336...
-vt -0.00026982253620778246 1.0889551245916031e-005
-vt -5.5749955701879517e-005 6.5745791941951553e-005
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-# vt341...
-vt 0.00018837903294238734 -6.5734964474666166e-005
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-# vt346...
-vt 0.00035982935044896053 -6.2738681254601567e-005
-vt 0.0016220208265700711 0.0030674309702910531
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-# vt351...
-vt 0.00074478599448327826 0.0013061597084310884
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-vt 0.00033641101124339684 0.00026436073968692656
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-# vt356...
-vt -0.00039448131103753115 -6.8023561948111317e-005
-vt 4.1139672877388289e-005 -0.00022705792691598881
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-# vt361...
-vt 0.00032802198828531942 0.00034853408352643832
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-vt 0.00050092253274437032 0.00039771236277198491
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-vt -0.00051464684929120041 0.00081831977149145619
-# vt366...
-vt 0.00035869327236112691 -6.367668064312604e-005
-vt 0.00035807440242961036 -6.3409865269778085e-005
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-vt 4.1476205735885285e-005 -0.00022670970303311221
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-# vt371...
-vt -0.00039308082970149205 -0.00054695209075438943
-vt 0.053652357630424759 -0.00054695209076883371
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-# vt376...
-vt 0.00042101574799833369 -5.2427360780754519e-005
-vt -0.0033160202654589563 0.00073583505428176713
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-vt -6.0267979251980852e-005 -0.0001937380379050008
-# vt381...
-vt -0.00029488823474140696 0.00018804080192064815
-vt 4.1096306917384751e-005 -0.00022678848684732917
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-# vt386...
-vt -0.0029317103864541193 0.0033129039401416514
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-# vt391...
-vt 0.00035843363257186123 -6.2574130232633625e-005
-vt 8.3159168293288344e-005 -9.1354265914546818e-005
-vt 0.00051930158135265331 0.00012937419905204972
-vt 4.6174568974662045e-005 0.00027234664886061121
-vt 4.2542313645095586e-005 0.00013173159945207788
-# vt396...
-vt 0.00035453803678414664 -6.5037755034447393e-005
-vt 0.00035877977030727981 -6.1056797592046045e-005
-vt -0.00050163419343606658 -5.7187863776029103e-005
-vt 0.0032628243109233609 -0.00054695209075610604
-vt 0.00013435197378656311 1.9527310565688595e-005
-# vt401...
-vt -0.0004394588181154957 -2.4389042802187128e-005
-vt 4.1276080348810751e-005 -0.00022644346520417157
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-vt 3.0813002464928629e-005 -0.00015075256768943326
-vt -0.00017569204330836891 0.00024598534447563139
-# vt406...
-vt -0.00031500872207302494 -0.00045090495693531193
-vt 4.0938414186245109e-005 -0.00022656177604298873
-vt -5.4321020917139085e-005 0.00010791081222291362
-vt -0.00044073054619391677 -0.00042580781039524174
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-# vt411...
-vt 0.00034407236524905405 -6.6746269820883749e-005
-vt 0.00034940084573979041 -6.4274410248058088e-005
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-vt -0.00019993730785236585 -0.00049889368869351447
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-# vt416...
-vt 0.00035225373203618543 -6.3018730129098103e-005
-vt 0.00037559343386042721 0.00072638381015765737
-vt 0.00068669619243790642 0.0036880654361709222
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-vt -0.0007122680113594293 -0.00054695209075429575
-# vt421...
-vt -0.00028741359972297292 0.00024956253352480088
-vt -0.00013009673869916055 -0.00021399690415388679
-vt 4.1443557392405184e-005 -0.00022517419671807675
-vt 0.00028417620711589098 -2.2494194696483943e-005
-vt -9.9290087510583991e-005 -0.0004690411938202087
-# vt426...
-vt 9.0961601685535243e-005 0.00011441939490779835
-vt -0.008915815696551907 -0.00054695209075337418
-vt 5.1150512784141344e-005 -0.00022654815932901518
-vt 0.0009984124299211028 6.9765141188876732e-005
-vt 0.0010485773744363033 -0.00032808494673610214
-# vt431...
-vt -0.0050992388690662104 -0.00054695209075381578
-vt -0.0034939983324794276 -0.00054695209075391314
-vt -0.0051765464792582067 0.00055490048195267741
-vt -0.002595944826974346 -0.00038551000952315151
-vt 4.5206760254573597e-005 -0.00020494450746244103
-# vt436...
-vt -0.0011769240384388036 -6.7340957180854369e-005
-vt 0.00033610918782188415 -4.2602051583497222e-005
-vt -0.0012473340192851734 -5.1714862360013707e-005
-vt -0.0010849345088959628 -2.7278573154562594e-006
-vt -0.00087693488833119615 0.00021884666573131846
-# vt441...
-vt -0.00050035167974331329 9.6669400871935438e-005
-vt -0.00019711281325496266 0.00016957885596564286
-vt -0.00036077647705250182 0.00010721191545282212
-vt -0.00032535376638184038 7.2163287480510731e-005
-vt -0.001107588368127306 0.00010119927120022781
-# vt446...
-vt 0.00035947963672628563 -6.2350569458366717e-005
-vt -0.00044749888206642441 1.241583341770301e-005
-vt -0.00078555879107546772 7.9229686282677385e-005
-vt -0.0010118305152371707 0.000210080703425661
-vt -0.00080094175870504963 0.00015694445719914595
-# vt451...
-vt 0.0015559630906459426 0.00042732975360259716
-vt -0.00088923874942754833 -1.0825345373112385e-005
-vt 0.00036001160786861691 -6.2530846784050471e-005
-vt -0.0004914285447024172 4.7220793937846834e-005
-vt -0.00098119339168790953 0.00016068107560308562
-# vt456...
-vt 3.8462236803503413e-005 -0.00021673867731242534
-vt -0.00040467934187116833 0.00013862946582367741
-vt -0.00060830045710391634 0.00010694888087246161
-vt -0.000977162634779212 1.8214811793532907e-005
-vt -0.0012083325069713671 0.00010391243504642039
-# vt461...
-vt -0.00079633435195801405 3.3090643972596978e-005
-vt 0.00034955817232433517 -5.4814346917811136e-005
-vt -0.003717645251875356 2.6051519441360285e-005
-vt -0.00089826307624218255 0.00010716394111772636
-vt -0.0026504244362573585 -8.1053036843060759e-005
-# vt466...
-vt -0.00050891668825628344 0.00016765343007019433
-vt 4.1704976349789258e-005 -0.00022690698616508587
-vt 8.5564845507687948e-005 -0.00014789036797580431
-vt -0.001062885778983419 5.7875617352780425e-005
-vt 0.00036989931179644275 -6.1570628543037382e-005
-# vt471...
-vt -0.00063682941661695469 5.3654593913324104e-005
-vt -0.00091574399827461239 6.0927021914978954e-005
-vt 0.00034095685232322925 -3.1838183953691542e-005
-vt -0.00088459578558120616 2.569516029592839e-005
-vt -0.0034596162628872974 -0.00023523111577633803
-# vt476...
-vt -0.0048153605047497848 3.8245848936176142e-005
-vt -0.00067999193508809508 1.0562006216050445e-005
-vt -0.00015686797118916879 0.0001448595650789899
-vt -0.0011144800286739462 1.2366480033302587e-005
-vt 4.1491764743904758e-005 -0.00022724357085580628
-# vt481...
-vt 0.0014941065777251961 -0.00011567786807328281
-vt 0.0021479968009426101 0.0016407277412438608
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-vt 4.6931949658636507e-005 -0.00022098867666485135
-vt 0.00036007368343944635 -6.274067303354842e-005
-# vt486...
-vt 0.00036445673809008122 -5.6737686089087841e-005
-vt 0.00036477793732619945 -6.2792796739559302e-005
-vt 0.00086459820808946347 0.00059744242118991585
-vt 0.00031415511630233928 9.6794674455233289e-006
-vt 0.00036100678984187645 -6.2707529308327265e-005
-# vt491...
-vt 0.00030454796427211578 -0.00054695209075471545
-vt 0.00036907934969235973 -5.8834052518171845e-005
-vt 0.00032948617540604075 7.1004385279006777e-005
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-vt 0.00038675225115048645 -3.5851519786377507e-005
-# vt496...
-vt -5.5510621435536645e-005 0.00018788485857701594
-vt 4.3069507691728681e-005 -0.00022336986328697192
-vt -0.00042915992449386875 0.00021131902233122353
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-vt -0.00050449891928404378 0.00042295764364934352
-# vt501...
-vt 0.0016096661506526944 0.0012971479704112884
-vt 0.00039091411360207134 -6.0995410770226638e-005
-vt 5.6902177624502948e-005 -0.00017656577848712654
-vt 0.0033300550630579046 0.00031926371232460899
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-# vt506...
-vt 0.00022882275088797338 4.6369965622538624e-005
-vt 0.00036097237539729071 -6.2198136327671011e-005
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-vt 4.2209198637323253e-005 -0.00022550988138080893
-# vt511...
-vt -3.58626105452578e-005 0.0001510290921702196
-vt 0.0003602010549014073 -6.2543672190284094e-005
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-vt 0.00063817363212081979 0.00048899953036406435
-# vt516...
-vt 0.00021516298997495409 0.00054125766251892358
-vt 5.4713360956540336e-005 -0.00021517774690321624
-vt 0.00052546958154729706 0.00031423276795503855
-vt -5.747279103754388e-006 0.0005336438727956155
-vt -0.00020146299174690629 0.00041252273977903525
-# vt521...
-vt 0.00023728247825621079 0.00043185288099039157
-vt 0.00036052537132166135 -6.3214194485593234e-005
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-vt 4.1834436622062432e-005 -0.00022667088709682004
-vt 4.1353578501858446e-005 -0.00022707873524408298
-# vt526...
-vt -0.00021909266944385858 0.00033091876492733591
-vt -0.00043828009984517302 0.00032353382988244551
-vt -2.245236056513944e-005 0.0003439383843449258
-vt -0.00017425232750206687 0.00062753605833984212
-vt -0.00065596391905514001 0.0002236933633671974
-# vt531...
-vt 0.00036133070303565745 -6.3332639204390626e-005
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-vt 4.7804736400862413e-005 -0.00021448187862202955
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-# vt536...
-vt 6.2145721837089662e-005 -0.00019237641766345814
-vt 0.00036124438436041517 -6.3223242700040242e-005
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-vt 0.0016084363994706002 -0.00035080842274704698
-# vt541...
-vt 0.00036211751633935529 -6.2829821864229481e-005
-vt 0.00035975614062871974 -6.2311887086096535e-005
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-# vt546...
-vt 0.00036051483136779333 -6.2485033049888979e-005
-vt 0.00037595616579499946 -4.7587925625290259e-005
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-vt 5.4042984259400351e-005 0.00020385672119289694
-# vt551...
-vt 0.00010264022758140617 0.00023257318675489521
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-vt 0.00011169034618137286 0.00018894216918890312
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-# vt556...
-vt 0.00045594215284366219 4.5758741777765532e-005
-vt 0.00036501179662182248 -6.017543657686102e-005
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-# vt561...
-vt 0.00036363941052765247 -6.2171127360989456e-005
-vt 0.00036338171845784473 -6.0418998287144155e-005
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-vt 0.00011827014230314514 0.00030703810580727932
-# vt566...
-vt 0.00051208105346509797 5.2711787315806941e-006
-vt 0.00083128431740057268 0.00027194869130294733
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-vt 0.00022131835210296991 0.00022077675009848766
-# vt571...
-vt 0.00028759830588982044 0.00017967525734135311
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-vt 6.0596926045208832e-005 0.00087131652774511271
-# vt576...
-vt 0.00020759493587380745 0.00034214891733197266
-vt 0.00037342038915083586 8.2580187418126007e-006
-vt 5.6627817292383142e-005 -0.00020966456622696004
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-# vt581...
-vt 0.00050841635395532797 0.00018834085459104393
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-vt 0.00071308404710498929 0.00079986596436315788
-# vt586...
-vt 4.1233934523397797e-005 -0.00022693565479827733
-vt 4.1294682750978029e-005 -0.00022699695840036171
-vt 4.1251334812822393e-005 -0.00022706068386194354
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-vt 0.00013164744717800853 -0.00012598831803340284
-# vt591...
-vt 4.1244086578288985e-005 -0.00022717167104963618
-vt 8.7378365560837612e-005 -0.00018317103105594941
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-vt 0.0001502139887324741 -0.00015031526844758674
-# vt596...
-vt 4.1360947814532423e-005 -0.00022717471550833267
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-# vt601...
-vt 0.00025304044197436287 -0.00026512665285546768
-vt 0.0007849694213676664 -0.00054695209075496264
-vt 0.000224161908613775 -0.00034975172676634354
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-vt 0.00031663557270901477 -0.00036664639039884822
-# vt606...
-vt 0.00018919573353531199 -0.00042082786923390862
-vt 0.00036024040564622273 -6.3076165488912522e-005
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-# vt611...
-vt 0.0003145394661469153 -0.0004557643189951222
-vt 5.9976728361797738e-005 -0.00054695209075459868
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-# vt616...
-vt 4.3294022514857311e-005 -0.00022691039478391344
-vt 4.2663496703065906e-005 -0.0002273537018109123
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-# vt621...
-vt 0.0011852375105396024 0.00028621288406491241
-vt 5.4653538431530257e-005 -0.0002234538397080683
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-vt 8.46631870812381e-005 -0.00021767141602969562
-# vt626...
-vt 0.00052586052739910655 -0.00027422166721589603
-vt 0.00036056012157782008 -6.3296350166962224e-005
-vt 0.0014391333462890205 -0.00054695209075530211
-vt 0.00036376288619995034 -6.3178596290743017e-005
-vt 0.00053319740366350454 -0.00049584836366339173
-# vt631...
-vt 0.0016617519733806013 0.00018859946996044612
-vt 0.0012920913675180529 0.00017053821448398778
-vt 0.00040063819341544515 -0.00033498214625988219
-vt 6.3025608868158556e-005 -0.0002248904632651084
-vt 0.00010060501519894988 -0.0002330098049473791
-# vt636...
-vt 0.00016640279987878426 -0.00025322969086529097
-vt 4.2794846981025758e-005 -0.0002267036179093073
-vt 0.00061578467474991683 -0.00019759630944445213
-vt 0.00055548631775927809 3.3626670182587085e-005
-vt 4.8269344814992621e-005 -0.00022580626240101178
-# vt641...
-vt 4.207964413508597e-005 -0.00022778358942837656
-vt 0.00076592437052051821 -0.00030836329260283874
-vt 6.8904882406142787e-005 -0.00022744539362258879
-vt 0.00024172166954384428 -0.00024224075950873163
-vt 0.00098443374311269621 0.00020078832401164838
-# vt646...
-vt 0.00047653758791288414 -0.00042191010511834323
-vt 0.0012335559040246302 -0.00041218728322919504
-vt 0.00056184970880317209 -9.9911881959534809e-005
-vt 4.1266289549007906e-005 -0.00022721545660209718
-vt 0.0011482991829012412 3.0628854712584554e-006
-# vt651...
-vt -0.0013871665671167932 0.00011386605477446774
-vt 0.00036109496030186511 -6.332933379224622e-005
-vt 4.270296028382331e-005 -0.00022835621497037237
-vt 0.0018355714651603142 -3.0943134654371819e-005
-vt 5.3301078671234847e-005 -0.00022849005076701237
-# vt656...
-vt 0.00036053457265523836 -6.3166463525718864e-005
-vt 0.00089656088382198545 -0.00011862112480694848
-vt 0.00076651371060895701 0.00014505183753662641
-vt 4.4753468290061049e-005 -0.00022690551571185301
-vt -0.00068599219796237898 0.0015260493252490914
-# vt661...
-vt -0.0014883110274824737 -0.00024239721489391456
-vt 4.4691170278124415e-005 -0.00022599652862207429
-vt 5.6060987484937708e-005 -0.00021992620652952125
-vt 0.001145150803806623 -0.00015059976606216012
-vt 4.1969868371752317e-005 -0.00022705277282695119
-# vt666...
-vt 0.0029218855550680531 0.00055595573094418345
-vt -0.0016691842147898706 -0.00043086794610432903
-vt -0.0014867841348051997 0.00020917197100831994
-vt -0.0013242010033718762 2.1413978845399992e-005
-vt -0.0019086835513123929 -0.00031576792047078477
-# vt671...
-vt -0.001855513778540846 -1.2462828438018683e-005
-vt -0.0013322872443249853 0.00038824140924251726
-vt -0.0016553409775530159 -0.00011669311619401347
-vt -0.0021383327478252806 -0.00025148225828484515
-vt 0.00037442192655640083 -6.1315481624439378e-005
-# vt676...
-vt -0.001244471499541891 0.00015031638811803722
-vt -0.0014223315660721117 -0.00028697931233295115
-vt 0.00036847471603284471 -6.3018014294032021e-005
-vt -0.00083835318691930644 0.0008052562772762076
-vt -0.0011286200383430547 0.0008985708688167693
-# vt681...
-vt -0.0013225432649090901 -0.00020612645740481747
-vt -0.0023609475570046702 -0.00017705725632002813
-vt -0.0012818426221271884 -0.00014479134001746391
-vt -0.0013734368593146876 -5.3191953806258976e-005
-vt -0.0012808444123899795 0.0005909766789365874
-# vt686...
-vt -0.0012387712008604945 -7.913295460203521e-006
-vt -0.0017887853629196399 0.00039489556809699147
-vt -0.0016955569918913685 0.00024022859146482134
-vt -0.0021818006517111514 6.3471766134289313e-006
-vt 0.00036484537173418763 -6.3940261421045308e-005
-# vt691...
-vt -0.0012044148687525291 3.3759008056441541e-005
-vt -0.0014517804592794198 -0.00016903828981500461
-vt 0.00036178909600838999 -6.3649573382262284e-005
-vt 0.00036824577371736417 -6.6282125783877373e-005
-vt 0.00036079317835525926 -6.3327347959177488e-005
-# vt696...
-vt 0.0003634639700267478 -6.7609515454639471e-005
-vt 5.6302412049999417e-005 -0.00024878431424447999
-vt 0.00038719658477602559 -7.7521329385170173e-005
-vt 0.0003622942568042159 -6.3551238731099791e-005
-vt 4.1214517132875939e-005 -0.00022755283014161507
-# vt701...
-vt 0.00036081593476159496 -6.3283099499651272e-005
-vt 0.00053501477084256371 -6.1426265626177579e-005
-vt 0.00040147376781606708 -0.00020291903103146372
-vt 4.134526859454063e-005 -0.00022732653764938711
-vt 0.00036077593745215825 -6.3221646633230058e-005
-# vt706...
-vt 4.3574308062128975e-005 -0.00022975249134383493
-vt 4.0973492978678416e-005 -0.00022866752225603806
-vt 0.00036289776704728077 -6.3821574330754109e-005
-vt 0.00010287801346945541 -0.00025222254580359245
-vt 4.3386032460623891e-005 -0.00023211719172408837
-# vt711...
-vt 0.00036198320903760989 -6.3375299942071406e-005
-vt 4.1300399781292463e-005 -0.00022724280224749202
-vt 0.00036583439642947496 -6.3048894376417175e-005
-vt 0.00036948694452735437 -7.1038607419160753e-005
-vt 0.00038503724119767768 -0.00015441540912669263
-# vt716...
-vt 0.00017071386671206612 -0.00030274030217242442
-vt 5.2959480895481414e-005 -0.00023460276263206106
-vt 0.000363932628506064 -6.5754347326925095e-005
-vt 0.00036131281245140034 -6.3439128622252321e-005
-vt 0.0004571762155527459 -0.00011535315444953785
-# vt721...
-vt 0.00038173559379748451 -6.8414431820887085e-005
-vt 0.0003626181250270949 -6.4864205116271876e-005
-vt 4.0889396346971418e-005 -0.00023001390704918478
-vt 4.1377811549746235e-005 -0.00022795947927517452
-vt 0.00042902998775316836 -6.082500433260261e-005
-# vt726...
-vt 6.6809551057332717e-005 -0.00023562520557965778
-vt 0.00036913964778236691 -0.00010334878959095936
-vt 0.00039605635771772923 -0.00011247356543909776
-vt 0.0004206747222388757 -7.5226591516593913e-005
-vt 8.5649725934638932e-005 -0.00029449165372462589
-# vt731...
-vt 4.4337674203420718e-005 -0.00022806765722249717
-vt 0.00041911908428286099 -9.6257256102830278e-005
-vt 0.00031229880107452868 -0.00030109903026678049
-vt 0.00037326172999273266 -6.5136809689127142e-005
-vt 0.00036053152277821382 -6.3242591271408328e-005
-# vt736...
-vt 4.1473025577609679e-005 -0.00022751596735098005
-vt 0.0003636163752468724 -6.3462787919641773e-005
-# the faces themselves
-# f1...
-f 576/576 555/555 353/353
-f 347/347 267/267 279/279
-f 374/374 334/334 345/345
-f 389/389 385/385 329/329
-f 737/737 708/708 690/690
-# f6...
-f 497/497 73/73 423/423
-f 416/416 413/413 90/90
-f 96/96 7/7 19/19
-f 366/366 133/133 325/325
-f 416/416 403/403 384/384
-# f11...
-f 403/403 396/396 367/367
-f 383/383 81/81 31/31
-f 413/413 92/92 90/90
-f 416/416 384/384 413/413
-f 519/519 190/190 516/516
-# f16...
-f 373/373 307/307 230/230
-f 400/400 332/332 82/82
-f 647/647 628/628 540/540
-f 418/418 279/279 386/386
-f 478/478 444/444 379/379
-# f21...
-f 396/396 366/366 367/367
-f 337/337 38/38 332/332
-f 519/519 417/417 53/53
-f 391/391 374/374 345/345
-f 379/379 1/1 44/44
-# f26...
-f 96/96 16/16 81/81
-f 396/396 319/319 133/133
-f 96/96 81/81 7/7
-f 544/544 515/515 363/363
-f 383/383 338/338 83/83
-# f31...
-f 424/424 342/342 338/338
-f 372/372 80/80 70/70
-f 413/413 58/58 92/92
-f 271/271 270/270 241/241
-f 415/415 236/236 11/11
-# f36...
-f 81/81 16/16 31/31
-f 365/365 89/89 61/61
-f 452/452 33/33 27/27
-f 452/452 27/27 68/68
-f 452/452 68/68 28/28
-# f41...
-f 331/331 326/326 280/280
-f 447/447 97/97 444/444
-f 100/100 11/11 50/50
-f 390/390 329/329 385/385
-f 270/270 175/175 241/241
-# f46...
-f 383/383 83/83 81/81
-f 62/62 27/27 33/33
-f 477/477 87/87 54/54
-f 389/389 335/335 344/344
-f 92/92 58/58 52/52
-# f51...
-f 548/548 363/363 515/515
-f 657/657 94/94 642/642
-f 380/380 13/13 76/76
-f 67/67 27/27 62/62
-f 68/68 27/27 67/67
-# f56...
-f 87/87 28/28 18/18
-f 396/396 133/133 366/366
-f 575/575 53/53 417/417
-f 81/81 22/22 7/7
-f 68/68 18/18 28/28
-# f61...
-f 87/87 48/48 54/54
-f 87/87 18/18 48/48
-f 345/345 334/334 326/326
-f 389/389 329/329 335/335
-f 78/78 47/47 62/62
-# f66...
-f 68/68 67/67 23/23
-f 68/68 56/56 18/18
-f 275/275 249/249 136/136
-f 519/519 516/516 417/417
-f 585/585 548/548 515/515
-# f71...
-f 518/518 361/361 353/353
-f 93/93 47/47 78/78
-f 68/68 23/23 56/56
-f 401/401 54/54 398/398
-f 515/515 514/514 488/488
-# f76...
-f 703/703 626/626 618/618
-f 74/74 67/67 47/47
-f 74/74 23/23 67/67
-f 60/60 18/18 56/56
-f 398/398 54/54 48/48
-# f81...
-f 683/683 9/9 93/93
-f 735/735 522/522 262/262
-f 731/731 659/659 617/617
-f 60/60 48/48 18/18
-f 731/731 120/120 659/659
-# f86...
-f 727/727 698/698 260/260
-f 93/93 74/74 47/47
-f 606/606 603/603 285/285
-f 93/93 9/9 72/72
-f 93/93 72/72 74/74
-# f91...
-f 139/139 48/48 60/60
-f 301/301 5/5 71/71
-f 347/347 271/271 267/267
-f 103/103 102/102 99/99
-f 234/234 74/74 142/142
-# f96...
-f 530/530 527/527 282/282
-f 571/571 353/353 570/570
-f 722/722 693/693 266/266
-f 312/312 296/296 226/226
-f 575/575 529/529 53/53
-# f101...
-f 726/726 697/697 709/709
-f 575/575 89/89 529/529
-f 719/719 652/652 219/219
-f 158/158 30/30 139/139
-f 225/225 222/222 181/181
-# f106...
-f 159/159 123/123 155/155
-f 409/409 32/32 406/406
-f 631/631 64/64 451/451
-f 736/736 109/109 480/480
-f 695/695 219/219 652/652
-# f111...
-f 716/716 603/603 601/601
-f 528/528 190/190 187/187
-f 521/521 516/516 190/190
-f 552/552 523/523 509/509
-f 675/675 288/288 554/554
-# f116...
-f 341/341 83/83 338/338
-f 715/715 256/256 43/43
-f 737/737 629/629 580/580
-f 642/642 45/45 430/430
-f 638/638 618/618 626/626
-# f121...
-f 732/732 729/729 698/698
-f 409/409 115/115 194/194
-f 308/308 59/59 205/205
-f 734/734 694/694 721/721
-f 336/336 97/97 327/327
-# f126...
-f 730/730 636/636 709/709
-f 728/728 715/715 720/720
-f 574/574 551/551 394/394
-f 100/100 50/50 26/26
-f 649/649 594/594 591/591
-# f131...
-f 737/737 711/711 699/699
-f 197/197 50/50 11/11
-f 572/572 570/570 553/553
-f 416/416 90/90 412/412
-f 736/736 724/724 641/641
-# f136...
-f 723/723 710/710 706/706
-f 197/197 122/122 105/105
-f 544/544 363/363 518/518
-f 306/306 257/257 226/226
-f 570/570 551/551 553/553
-# f141...
-f 721/721 714/714 698/698
-f 105/105 21/21 50/50
-f 197/197 105/105 50/50
-f 50/50 21/21 26/26
-f 500/500 230/230 307/307
-# f146...
-f 719/719 219/219 283/283
-f 283/283 219/219 269/269
-f 293/293 251/251 257/257
-f 700/700 290/290 84/84
-f 300/300 275/275 113/113
-# f151...
-f 511/511 408/408 395/395
-f 179/179 10/10 21/21
-f 330/330 26/26 10/10
-f 179/179 15/15 10/10
-f 518/518 363/363 361/361
-# f156...
-f 196/196 15/15 179/179
-f 330/330 15/15 4/4
-f 330/330 10/10 15/15
-f 67/67 62/62 47/47
-f 208/208 4/4 123/123
-# f161...
-f 422/422 88/88 385/385
-f 737/737 699/699 708/708
-f 713/713 487/487 629/629
-f 307/307 232/232 282/282
-f 208/208 34/34 41/41
-# f166...
-f 576/576 353/353 361/361
-f 271/271 241/241 267/267
-f 408/408 44/44 337/337
-f 736/736 641/641 109/109
-f 718/718 696/696 694/694
-# f171...
-f 648/648 618/618 638/638
-f 727/727 260/260 244/244
-f 449/449 273/273 388/388
-f 709/709 110/110 635/635
-f 726/726 709/709 635/635
-# f176...
-f 416/416 412/412 403/403
-f 158/158 112/112 30/30
-f 724/724 250/250 707/707
-f 208/208 159/159 129/129
-f 407/407 17/17 129/129
-# f181...
-f 372/372 70/70 360/360
-f 418/418 347/347 279/279
-f 358/358 143/143 357/357
-f 334/334 323/323 326/326
-f 727/727 244/244 59/59
-# f186...
-f 715/715 599/599 703/703
-f 715/715 43/43 599/599
-f 412/412 396/396 403/403
-f 312/312 226/226 257/257
-f 559/559 550/550 496/496
-# f191...
-f 697/697 275/275 321/321
-f 732/732 720/720 702/702
-f 390/390 88/88 76/76
-f 497/497 6/6 73/73
-f 581/581 353/353 278/278
-# f196...
-f 719/719 693/693 711/711
-f 714/714 694/694 696/696
-f 574/574 550/550 551/551
-f 716/716 601/601 636/636
-f 737/737 690/690 713/713
-# f201...
-f 418/418 386/386 268/268
-f 235/235 129/129 159/159
-f 456/456 26/26 330/330
-f 168/168 39/39 145/145
-f 715/715 703/703 618/618
-# f206...
-f 655/655 120/120 619/619
-f 179/179 105/105 122/122
-f 227/227 138/138 145/145
-f 293/293 257/257 286/286
-f 203/203 56/56 23/23
-# f211...
-f 306/306 226/226 149/149
-f 234/234 150/150 23/23
-f 203/203 23/23 150/150
-f 234/234 142/142 121/121
-f 181/181 156/156 138/138
-# f216...
-f 667/667 102/102 104/104
-f 724/724 653/653 641/641
-f 170/170 121/121 142/142
-f 234/234 164/164 150/150
-f 222/222 135/135 181/181
-# f221...
-f 218/218 171/171 131/131
-f 218/218 170/170 171/171
-f 203/203 150/150 158/158
-f 163/163 138/138 156/156
-f 170/170 147/147 121/121
-# f226...
-f 164/164 158/158 150/150
-f 218/218 217/217 170/170
-f 217/217 147/147 170/170
-f 153/153 121/121 147/147
-f 234/234 121/121 153/153
-# f231...
-f 234/234 153/153 164/164
-f 677/677 182/182 131/131
-f 218/218 131/131 206/206
-f 164/164 148/148 158/158
-f 206/206 131/131 182/182
-# f236...
-f 218/218 206/206 217/217
-f 191/191 164/164 153/153
-f 233/233 153/153 147/147
-f 158/158 148/148 112/112
-f 357/357 224/224 243/243
-# f241...
-f 233/233 147/147 217/217
-f 199/199 164/164 191/191
-f 199/199 148/148 164/164
-f 195/195 174/174 116/116
-f 667/667 176/176 182/182
-# f246...
-f 667/667 104/104 176/176
-f 233/233 191/191 153/153
-f 206/206 182/182 176/176
-f 199/199 173/173 148/148
-f 217/217 206/206 177/177
-# f251...
-f 217/217 177/177 144/144
-f 233/233 217/217 144/144
-f 233/233 125/125 191/191
-f 200/200 191/191 125/125
-f 200/200 199/199 191/191
-# f256...
-f 200/200 162/162 199/199
-f 199/199 162/162 173/173
-f 204/204 148/148 173/173
-f 204/204 112/112 148/148
-f 206/206 176/176 177/177
-# f261...
-f 204/204 172/172 112/112
-f 233/233 144/144 117/117
-f 233/233 117/117 125/125
-f 447/447 54/54 401/401
-f 186/186 132/132 12/12
-# f266...
-f 195/195 160/160 180/180
-f 711/711 535/535 531/531
-f 177/177 107/107 154/154
-f 177/177 176/176 107/107
-f 177/177 154/154 144/144
-# f271...
-f 220/220 161/161 159/159
-f 151/151 125/125 117/117
-f 204/204 173/173 169/169
-f 237/237 204/204 169/169
-f 237/237 172/172 204/204
-# f276...
-f 172/172 29/29 112/112
-f 730/730 697/697 321/321
-f 321/321 136/136 134/134
-f 223/223 167/167 166/166
-f 212/212 144/144 154/154
-# f281...
-f 212/212 210/210 144/144
-f 210/210 117/117 144/144
-f 178/178 125/125 151/151
-f 209/209 200/200 125/125
-f 209/209 125/125 178/178
-# f286...
-f 209/209 157/157 200/200
-f 200/200 157/157 162/162
-f 173/173 162/162 152/152
-f 162/162 157/157 152/152
-f 173/173 152/152 169/169
-# f291...
-f 238/238 172/172 237/237
-f 238/238 29/29 172/172
-f 717/717 619/619 706/706
-f 210/210 118/118 117/117
-f 151/151 117/117 118/118
-# f296...
-f 238/238 237/237 169/169
-f 186/186 12/12 63/63
-f 223/223 166/166 211/211
-f 422/422 385/385 259/259
-f 178/178 151/151 118/118
-# f301...
-f 209/209 178/178 157/157
-f 344/344 30/30 29/29
-f 167/167 12/12 132/132
-f 188/188 157/157 178/178
-f 238/238 169/169 114/114
-# f306...
-f 234/234 23/23 74/74
-f 211/211 160/160 116/116
-f 221/221 178/178 118/118
-f 238/238 114/114 140/140
-f 212/212 154/154 111/111
-# f311...
-f 154/154 101/101 111/111
-f 212/212 111/111 210/210
-f 169/169 152/152 157/157
-f 193/193 114/114 169/169
-f 171/171 170/170 72/72
-# f316...
-f 675/675 284/284 502/502
-f 210/210 207/207 118/118
-f 221/221 118/118 207/207
-f 302/302 114/114 193/193
-f 302/302 140/140 114/114
-# f321...
-f 300/300 124/124 249/249
-f 222/222 155/155 135/135
-f 208/208 123/123 159/159
-f 225/225 116/116 174/174
-f 235/235 143/143 128/128
-# f326...
-f 548/548 516/516 521/521
-f 210/210 111/111 207/207
-f 221/221 188/188 178/178
-f 193/193 169/169 157/157
-f 111/111 101/101 75/75
-# f331...
-f 216/216 157/157 188/188
-f 299/299 180/180 245/245
-f 235/235 128/128 129/129
-f 717/717 710/710 697/697
-f 220/220 214/214 161/161
-# f336...
-f 221/221 207/207 202/202
-f 221/221 202/202 146/146
-f 221/221 146/146 188/188
-f 216/216 188/188 115/115
-f 216/216 193/193 157/157
-# f341...
-f 300/300 168/168 124/124
-f 214/214 174/174 161/161
-f 207/207 111/111 75/75
-f 188/188 146/146 115/115
-f 227/227 12/12 167/167
-# f346...
-f 302/302 253/253 140/140
-f 679/679 365/365 175/175
-f 170/170 74/74 72/72
-f 202/202 137/137 146/146
-f 708/708 699/699 693/693
-# f351...
-f 394/394 313/313 309/309
-f 207/207 75/75 201/201
-f 207/207 201/201 202/202
-f 194/194 115/115 146/146
-f 357/357 143/143 161/161
-# f356...
-f 722/722 696/696 718/718
-f 202/202 201/201 137/137
-f 655/655 428/428 120/120
-f 225/225 155/155 222/222
-f 236/236 197/197 11/11
-# f361...
-f 194/194 146/146 137/137
-f 203/203 60/60 56/56
-f 225/225 181/181 116/116
-f 203/203 139/139 60/60
-f 300/300 63/63 39/39
-# f366...
-f 640/640 120/120 428/428
-f 420/420 201/201 75/75
-f 300/300 39/39 168/168
-f 723/723 707/707 186/186
-f 211/211 181/181 138/138
-# f371...
-f 729/729 725/725 698/698
-f 220/220 174/174 214/214
-f 163/163 145/145 138/138
-f 591/591 589/589 339/339
-f 227/227 145/145 12/12
-# f376...
-f 344/344 35/35 30/30
-f 211/211 116/116 181/181
-f 196/196 135/135 155/155
-f 735/735 705/705 522/522
-f 259/259 149/149 236/236
-# f381...
-f 306/306 149/149 259/259
-f 415/415 259/259 236/236
-f 613/613 262/262 563/563
-f 397/397 387/387 391/391
-f 382/382 128/128 143/143
-# f386...
-f 196/196 155/155 123/123
-f 195/195 116/116 160/160
-f 245/245 180/180 160/160
-f 236/236 149/149 184/184
-f 223/223 211/211 138/138
-# f391...
-f 312/312 251/251 285/285
-f 662/662 524/524 637/637
-f 226/226 130/130 149/149
-f 236/236 184/184 197/197
-f 287/287 242/242 255/255
-# f396...
-f 717/717 655/655 619/619
-f 184/184 149/149 130/130
-f 197/197 184/184 122/122
-f 722/722 718/718 690/690
-f 176/176 104/104 107/107
-# f401...
-f 306/306 286/286 257/257
-f 735/735 695/695 701/701
-f 168/168 145/145 163/163
-f 227/227 223/223 138/138
-f 235/235 161/161 143/143
-# f406...
-f 420/420 137/137 201/201
-f 225/225 174/174 220/220
-f 670/670 102/102 667/667
-f 198/198 134/134 130/130
-f 184/184 141/141 122/122
-# f411...
-f 141/141 119/119 122/122
-f 196/196 123/123 4/4
-f 705/705 701/701 652/652
-f 306/306 259/259 185/185
-f 321/321 198/198 296/296
-# f416...
-f 145/145 39/39 12/12
-f 184/184 130/130 141/141
-f 179/179 122/122 165/165
-f 165/165 122/122 119/119
-f 189/189 141/141 130/130
-# f421...
-f 543/543 359/359 506/506
-f 179/179 21/21 105/105
-f 321/321 134/134 198/198
-f 189/189 130/130 134/134
-f 664/664 642/642 430/430
-# f426...
-f 141/141 126/126 119/119
-f 165/165 119/119 156/156
-f 156/156 119/119 126/126
-f 211/211 166/166 160/160
-f 724/724 707/707 653/653
-# f431...
-f 189/189 134/134 124/124
-f 189/189 126/126 141/141
-f 649/649 247/247 252/252
-f 196/196 4/4 15/15
-f 707/707 250/250 132/132
-# f436...
-f 296/296 198/198 226/226
-f 165/165 156/156 127/127
-f 179/179 165/165 127/127
-f 196/196 179/179 127/127
-f 627/627 287/287 269/269
-# f441...
-f 208/208 17/17 77/77
-f 227/227 167/167 223/223
-f 249/249 124/124 134/134
-f 725/725 376/376 502/502
-f 220/220 159/159 155/155
-# f446...
-f 225/225 220/220 155/155
-f 532/532 462/462 8/8
-f 224/224 161/161 174/174
-f 166/166 3/3 160/160
-f 224/224 174/174 195/195
-# f451...
-f 588/588 357/357 339/339
-f 163/163 156/156 126/126
-f 196/196 127/127 135/135
-f 660/660 271/271 347/347
-f 425/425 251/251 293/293
-# f456...
-f 235/235 159/159 161/161
-f 357/357 161/161 224/224
-f 168/168 126/126 124/124
-f 189/189 124/124 126/126
-f 168/168 163/163 126/126
-# f461...
-f 104/104 102/102 103/103
-f 208/208 77/77 34/34
-f 466/466 457/457 381/381
-f 181/181 127/127 156/156
-f 181/181 135/135 127/127
-# f466...
-f 693/693 213/213 266/266
-f 386/386 46/46 268/268
-f 386/386 80/80 46/46
-f 320/320 246/246 298/298
-f 320/320 244/244 246/246
-# f471...
-f 319/319 276/276 311/311
-f 707/707 132/132 186/186
-f 373/373 297/297 307/307
-f 548/548 521/521 363/363
-f 660/660 65/65 91/91
-# f476...
-f 386/386 70/70 80/80
-f 377/377 51/51 65/65
-f 529/529 89/89 272/272
-f 529/529 499/499 519/519
-f 520/520 519/519 499/499
-# f481...
-f 319/319 311/311 292/292
-f 530/530 294/294 527/527
-f 351/351 175/175 61/61
-f 528/528 187/187 309/309
-f 274/274 265/265 247/247
-# f486...
-f 585/585 304/304 417/417
-f 575/575 351/351 61/61
-f 511/511 478/478 379/379
-f 511/511 496/496 478/478
-f 730/730 312/312 285/285
-# f491...
-f 530/530 440/440 450/450
-f 290/290 265/265 84/84
-f 722/722 298/298 696/696
-f 308/308 106/106 256/256
-f 731/731 653/653 706/706
-# f496...
-f 301/301 267/267 5/5
-f 274/274 243/243 195/195
-f 287/287 262/262 242/242
-f 702/702 618/618 648/648
-f 737/737 580/580 711/711
-# f501...
-f 250/250 3/3 132/132
-f 276/276 205/205 59/59
-f 276/276 19/19 205/205
-f 360/360 70/70 66/66
-f 730/730 321/321 296/296
-# f506...
-f 700/700 84/84 299/299
-f 274/274 84/84 265/265
-f 482/482 267/267 241/241
-f 727/727 59/59 308/308
-f 732/732 702/702 729/729
-# f511...
-f 722/722 266/266 298/298
-f 319/319 292/292 133/133
-f 559/559 511/511 395/395
-f 299/299 274/274 195/195
-f 351/351 304/304 291/291
-# f516...
-f 501/501 482/482 241/241
-f 311/311 298/298 266/266
-f 585/585 303/303 304/304
-f 501/501 241/241 351/351
-f 575/575 304/304 351/351
-# f521...
-f 91/91 65/65 51/51
-f 712/712 252/252 704/704
-f 695/695 627/627 219/219
-f 498/498 381/381 421/421
-f 311/311 266/266 292/292
-# f526...
-f 707/707 706/706 653/653
-f 245/245 160/160 3/3
-f 530/530 282/282 440/440
-f 574/574 405/405 381/381
-f 205/205 7/7 106/106
-# f531...
-f 588/588 587/587 358/358
-f 307/307 273/273 232/232
-f 521/521 361/361 363/363
-f 585/585 515/515 488/488
-f 301/301 66/66 70/70
-# f536...
-f 308/308 205/205 106/106
-f 735/735 287/287 627/627
-f 305/305 245/245 250/250
-f 299/299 84/84 274/274
-f 320/320 59/59 244/244
-# f541...
-f 542/542 397/397 446/446
-f 572/572 543/543 571/571
-f 301/301 70/70 279/279
-f 723/723 63/63 113/113
-f 320/320 276/276 59/59
-# f546...
-f 449/449 440/440 232/232
-f 565/565 394/394 551/551
-f 681/681 677/677 131/131
-f 250/250 245/245 3/3
-f 736/736 290/290 700/700
-# f551...
-f 570/570 353/353 555/555
-f 565/565 551/551 555/555
-f 438/438 78/78 436/436
-f 501/501 351/351 291/291
-f 591/591 339/339 243/243
-# f556...
-f 292/292 263/263 133/133
-f 312/312 257/257 251/251
-f 304/304 303/303 291/291
-f 348/348 293/293 286/286
-f 482/482 5/5 267/267
-# f561...
-f 292/292 266/266 283/283
-f 574/574 309/309 405/405
-f 574/574 442/442 496/496
-f 325/325 133/133 263/263
-f 496/496 442/442 478/478
-# f566...
-f 226/226 198/198 130/130
-f 274/274 247/247 243/243
-f 727/727 308/308 256/256
-f 501/501 79/79 482/482
-f 301/301 279/279 267/267
-# f571...
-f 559/559 553/553 550/550
-f 627/627 269/269 219/219
-f 554/554 545/545 470/470
-f 292/292 269/269 263/263
-f 292/292 283/283 269/269
-# f576...
-f 576/576 565/565 555/555
-f 570/570 555/555 551/551
-f 571/571 278/278 353/353
-f 571/571 543/543 278/278
-f 320/320 298/298 311/311
-# f581...
-f 167/167 132/132 166/166
-f 283/283 266/266 213/213
-f 388/388 273/273 297/297
-f 721/721 694/694 714/714
-f 302/302 193/193 264/264
-# f586...
-f 287/287 255/255 269/269
-f 731/731 706/706 619/619
-f 269/269 255/255 263/263
-f 576/576 313/313 565/565
-f 325/325 263/263 255/255
-# f591...
-f 302/302 264/264 253/253
-f 704/704 252/252 290/290
-f 712/712 649/649 252/252
-f 576/576 521/521 313/313
-f 261/261 192/192 216/216
-# f596...
-f 264/264 216/216 192/192
-f 249/249 134/134 136/136
-f 521/521 190/190 313/313
-f 528/528 313/313 190/190
-f 264/264 185/185 253/253
-# f601...
-f 259/259 253/253 185/185
-f 348/348 261/261 115/115
-f 734/734 690/690 694/694
-f 594/594 589/589 591/591
-f 700/700 299/299 305/305
-# f606...
-f 243/243 224/224 195/195
-f 719/719 213/213 693/693
-f 712/712 594/594 649/649
-f 286/286 192/192 261/261
-f 572/572 571/571 570/570
-# f611...
-f 63/63 12/12 39/39
-f 348/348 286/286 261/261
-f 306/306 264/264 192/192
-f 306/306 185/185 264/264
-f 264/264 193/193 216/216
-# f616...
-f 410/410 276/276 319/319
-f 320/320 311/311 276/276
-f 306/306 192/192 286/286
-f 406/406 293/293 348/348
-f 374/374 343/343 334/334
-# f621...
-f 324/324 242/242 322/322
-f 391/391 384/384 374/374
-f 86/86 81/81 83/83
-f 729/729 702/702 582/582
-f 446/446 391/391 346/346
-# f626...
-f 389/389 253/253 385/385
-f 86/86 22/22 81/81
-f 391/391 345/345 346/346
-f 106/106 22/22 43/43
-f 325/325 242/242 324/324
-# f631...
-f 334/334 325/325 324/324
-f 410/410 19/19 276/276
-f 612/612 425/425 414/414
-f 112/112 29/29 30/30
-f 333/333 85/85 38/38
-# f636...
-f 423/423 73/73 402/402
-f 419/419 40/40 35/35
-f 96/96 19/19 16/16
-f 730/730 285/285 716/716
-f 342/342 341/341 338/338
-# f641...
-f 57/57 41/41 34/34
-f 336/336 327/327 333/333
-f 506/506 400/400 342/342
-f 389/389 140/140 253/253
-f 408/408 379/379 44/44
-# f646...
-f 421/421 381/381 405/405
-f 662/662 624/624 524/524
-f 660/660 270/270 271/271
-f 208/208 41/41 4/4
-f 660/660 347/347 65/65
-# f651...
-f 585/585 417/417 548/548
-f 419/419 35/35 344/344
-f 418/418 268/268 65/65
-f 418/418 65/65 347/347
-f 389/389 29/29 140/140
-# f656...
-f 330/330 57/57 73/73
-f 390/390 76/76 328/328
-f 390/390 385/385 88/88
-f 389/389 344/344 29/29
-f 720/720 618/618 702/702
-# f661...
-f 613/613 322/322 242/242
-f 383/383 92/92 338/338
-f 447/447 327/327 97/97
-f 380/380 100/100 13/13
-f 506/506 426/426 400/400
-# f666...
-f 426/426 332/332 400/400
-f 390/390 328/328 69/69
-f 352/352 335/335 69/69
-f 333/333 40/40 85/85
-f 426/426 395/395 337/337
-# f671...
-f 426/426 337/337 332/332
-f 408/408 337/337 395/395
-f 366/366 325/325 343/343
-f 419/419 335/335 352/352
-f 511/511 379/379 408/408
-# f676...
-f 332/332 38/38 85/85
-f 354/354 341/341 342/342
-f 413/413 391/391 387/387
-f 497/497 484/484 6/6
-f 392/392 362/362 370/370
-# f681...
-f 384/384 367/367 374/374
-f 324/324 322/322 323/323
-f 419/419 352/352 40/40
-f 410/410 396/396 19/19
-f 411/411 19/19 396/396
-# f686...
-f 411/411 16/16 19/19
-f 411/411 90/90 16/16
-f 90/90 31/31 16/16
-f 365/365 228/228 89/89
-f 649/649 591/591 243/243
-# f691...
-f 343/343 325/325 334/334
-f 506/506 359/359 426/426
-f 485/485 346/346 368/368
-f 400/400 82/82 354/354
-f 406/406 32/32 371/371
-# f696...
-f 325/325 255/255 242/242
-f 380/380 11/11 100/100
-f 355/355 32/32 137/137
-f 336/336 333/333 38/38
-f 392/392 341/341 354/354
-# f701...
-f 368/368 331/331 280/280
-f 409/409 194/194 32/32
-f 194/194 137/137 32/32
-f 529/529 272/272 500/500
-f 375/375 35/35 40/40
-# f706...
-f 447/447 401/401 327/327
-f 371/371 32/32 355/355
-f 404/404 76/76 13/13
-f 352/352 85/85 40/40
-f 610/610 323/323 322/322
-# f711...
-f 375/375 333/333 327/327
-f 352/352 55/55 85/85
-f 362/362 354/354 82/82
-f 529/529 500/500 499/499
-f 350/350 86/86 341/341
-# f716...
-f 370/370 328/328 76/76
-f 415/415 11/11 380/380
-f 419/419 344/344 335/335
-f 362/362 55/55 328/328
-f 383/383 31/31 90/90
-# f721...
-f 520/520 190/190 519/519
-f 337/337 44/44 38/38
-f 422/422 415/415 380/380
-f 390/390 335/335 329/329
-f 437/437 338/338 52/52
-# f726...
-f 590/590 392/392 370/370
-f 662/662 616/616 659/659
-f 422/422 380/380 88/88
-f 414/414 406/406 371/371
-f 414/414 371/371 349/349
-# f731...
-f 526/526 187/187 190/190
-f 444/444 97/97 1/1
-f 405/405 309/309 187/187
-f 401/401 398/398 356/356
-f 590/590 370/370 468/468
-# f736...
-f 714/714 246/246 244/244
-f 371/371 355/355 340/340
-f 332/332 85/85 82/82
-f 85/85 55/55 82/82
-f 529/529 519/519 53/53
-# f741...
-f 170/170 142/142 74/74
-f 338/338 92/92 52/52
-f 375/375 327/327 356/356
-f 401/401 356/356 327/327
-f 425/425 406/406 414/414
-# f746...
-f 205/205 19/19 7/7
-f 400/400 354/354 342/342
-f 375/375 356/356 35/35
-f 407/407 129/129 128/128
-f 380/380 76/76 88/88
-# f751...
-f 357/357 243/243 339/339
-f 404/404 370/370 76/76
-f 476/476 377/377 433/433
-f 154/154 107/107 101/101
-f 341/341 86/86 83/83
-# f756...
-f 542/542 508/508 397/397
-f 328/328 55/55 69/69
-f 334/334 324/324 323/323
-f 362/362 82/82 55/55
-f 370/370 362/362 328/328
-# f761...
-f 572/572 426/426 359/359
-f 425/425 293/293 406/406
-f 352/352 69/69 55/55
-f 572/572 559/559 426/426
-f 559/559 395/395 426/426
-# f766...
-f 336/336 38/38 44/44
-f 374/374 367/367 343/343
-f 345/345 326/326 331/331
-f 375/375 40/40 333/333
-f 730/730 296/296 312/312
-# f771...
-f 355/355 137/137 340/340
-f 420/420 340/340 137/137
-f 336/336 44/44 1/1
-f 407/407 77/77 17/17
-f 468/468 370/370 404/404
-# f776...
-f 503/503 468/468 404/404
-f 544/544 514/514 515/515
-f 77/77 73/73 34/34
-f 336/336 1/1 97/97
-f 392/392 354/354 362/362
-# f781...
-f 407/407 402/402 77/77
-f 367/367 366/366 343/343
-f 410/410 319/319 396/396
-f 392/392 350/350 341/341
-f 412/412 90/90 411/411
-# f786...
-f 413/413 387/387 58/58
-f 413/413 384/384 391/391
-f 316/316 66/66 301/301
-f 409/409 348/348 115/115
-f 607/607 600/600 280/280
-# f791...
-f 390/390 69/69 335/335
-f 612/612 604/604 425/425
-f 398/398 48/48 30/30
-f 388/388 297/297 37/37
-f 503/503 404/404 13/13
-# f796...
-f 398/398 30/30 356/356
-f 356/356 30/30 35/35
-f 412/412 411/411 396/396
-f 307/307 297/297 273/273
-f 368/368 346/346 331/331
-# f801...
-f 383/383 90/90 92/92
-f 714/714 244/244 260/260
-f 711/711 693/693 699/699
-f 386/386 279/279 70/70
-f 208/208 129/129 17/17
-# f806...
-f 346/346 345/345 331/331
-f 585/585 488/488 303/303
-f 612/612 414/414 349/349
-f 402/402 73/73 77/77
-f 238/238 140/140 29/29
-# f811...
-f 106/106 7/7 22/22
-f 575/575 61/61 89/89
-f 73/73 57/57 34/34
-f 607/607 280/280 323/323
-f 728/728 727/727 715/715
-# f816...
-f 542/542 446/446 346/346
-f 581/581 318/318 353/353
-f 409/409 406/406 348/348
-f 403/403 367/367 384/384
-f 26/26 21/21 10/10
-# f821...
-f 518/518 353/353 318/318
-f 542/542 346/346 453/453
-f 530/530 450/450 466/466
-f 662/662 640/640 14/14
-f 397/397 8/8 58/58
-# f826...
-f 397/397 58/58 387/387
-f 675/675 554/554 470/470
-f 462/462 437/437 52/52
-f 642/642 630/630 45/45
-f 720/720 715/715 618/618
-# f831...
-f 648/648 638/638 94/94
-f 385/385 253/253 259/259
-f 462/462 58/58 8/8
-f 533/533 456/456 6/6
-f 724/724 700/700 305/305
-# f836...
-f 532/532 231/231 437/437
-f 473/473 437/437 231/231
-f 461/461 452/452 28/28
-f 662/662 659/659 640/640
-f 456/456 330/330 73/73
-# f841...
-f 714/714 696/696 246/246
-f 613/613 242/242 262/262
-f 728/728 698/698 727/727
-f 723/723 706/706 707/707
-f 489/489 424/424 473/473
-# f846...
-f 477/477 454/454 471/471
-f 454/454 54/54 447/447
-f 734/734 502/502 284/284
-f 437/437 424/424 338/338
-f 532/532 437/437 462/462
-# f851...
-f 469/469 439/439 459/459
-f 449/449 232/232 273/273
-f 479/479 439/439 469/469
-f 474/474 452/452 461/461
-f 474/474 472/472 459/459
-# f856...
-f 662/662 637/637 616/616
-f 691/691 479/479 469/469
-f 472/472 461/461 448/448
-f 474/474 461/461 472/472
-f 691/691 469/469 445/445
-# f861...
-f 686/686 439/439 479/479
-f 459/459 439/439 62/62
-f 705/705 537/537 523/523
-f 645/645 621/621 567/567
-f 471/471 458/458 461/461
-# f866...
-f 705/705 652/652 537/537
-f 658/658 567/567 581/581
-f 166/166 132/132 3/3
-f 472/472 469/469 459/459
-f 469/469 464/464 445/445
-# f871...
-f 717/717 706/706 710/710
-f 439/439 438/438 62/62
-f 472/472 448/448 464/464
-f 461/461 458/458 448/448
-f 299/299 195/195 180/180
-# f876...
-f 476/476 433/433 427/427
-f 474/474 459/459 452/452
-f 476/476 427/427 431/431
-f 477/477 471/471 461/461
-f 321/321 275/275 136/136
-# f881...
-f 472/472 464/464 469/469
-f 574/574 381/381 442/442
-f 592/592 468/468 503/503
-f 473/473 424/424 437/437
-f 477/477 54/54 454/454
-# f886...
-f 290/290 252/252 265/265
-f 476/476 431/431 463/463
-f 434/434 98/98 99/99
-f 476/476 463/463 377/377
-f 462/462 52/52 58/58
-# f891...
-f 438/438 436/436 62/62
-f 640/640 622/622 14/14
-f 710/710 113/113 697/697
-f 434/434 432/432 98/98
-f 659/659 120/120 640/640
-# f896...
-f 261/261 216/216 115/115
-f 478/478 442/442 443/443
-f 532/532 8/8 397/397
-f 463/463 431/431 432/432
-f 475/475 463/463 432/432
-# f901...
-f 586/586 382/382 358/358
-f 459/459 33/33 452/452
-f 471/471 454/454 441/441
-f 471/471 441/441 458/458
-f 457/457 442/442 381/381
-# f906...
-f 457/457 443/443 442/442
-f 478/478 443/443 444/444
-f 696/696 298/298 246/246
-f 475/475 465/465 463/463
-f 682/682 465/465 434/434
-# f911...
-f 444/444 1/1 379/379
-f 639/639 229/229 564/564
-f 455/455 440/440 449/449
-f 503/503 13/13 435/435
-f 632/632 451/451 621/621
-# f916...
-f 735/735 627/627 695/695
-f 455/455 450/450 440/440
-f 466/466 458/458 457/457
-f 457/457 441/441 443/443
-f 449/449 388/388 445/445
-# f921...
-f 455/455 449/449 445/445
-f 466/466 450/450 458/458
-f 458/458 441/441 457/457
-f 454/454 444/444 443/443
-f 456/456 435/435 13/13
-# f926...
-f 438/438 215/215 78/78
-f 722/722 708/708 693/693
-f 477/477 461/461 28/28
-f 475/475 432/432 434/434
-f 475/475 434/434 465/465
-# f931...
-f 460/460 445/445 388/388
-f 464/464 450/450 455/455
-f 454/454 443/443 441/441
-f 722/722 690/690 708/708
-f 459/459 62/62 33/33
-# f936...
-f 456/456 13/13 100/100
-f 456/456 73/73 6/6
-f 454/454 447/447 444/444
-f 464/464 455/455 445/445
-f 464/464 448/448 450/450
-# f941...
-f 458/458 450/450 448/448
-f 705/705 656/656 522/522
-f 623/623 613/613 563/563
-f 683/683 93/93 78/78
-f 552/552 509/509 490/490
-# f946...
-f 600/600 310/310 280/280
-f 552/552 314/314 310/310
-f 552/552 490/490 314/314
-f 485/485 368/368 310/310
-f 580/580 541/541 539/539
-# f951...
-f 546/546 310/310 314/314
-f 560/560 509/509 541/541
-f 541/541 509/509 539/539
-f 560/560 490/490 509/509
-f 512/512 485/485 310/310
-# f956...
-f 546/546 512/512 310/310
-f 507/507 314/314 490/490
-f 546/546 314/314 507/507
-f 440/440 282/282 232/232
-f 584/584 561/561 541/541
-# f961...
-f 512/512 453/453 485/485
-f 485/485 453/453 346/346
-f 561/561 560/560 541/541
-f 560/560 289/289 490/490
-f 507/507 490/490 289/289
-# f966...
-f 546/546 483/483 512/512
-f 512/512 483/483 453/453
-f 483/483 36/36 453/453
-f 561/561 557/557 560/560
-f 546/546 507/507 483/483
-# f971...
-f 530/530 498/498 294/294
-f 584/584 487/487 561/561
-f 583/583 36/36 483/483
-f 583/583 483/483 507/507
-f 561/561 487/487 545/545
-# f976...
-f 562/562 560/560 557/557
-f 562/562 289/289 560/560
-f 583/583 507/507 289/289
-f 713/713 470/470 487/487
-f 542/542 36/36 508/508
-# f981...
-f 583/583 508/508 36/36
-f 565/565 313/313 394/394
-f 713/713 678/678 470/470
-f 561/561 545/545 492/492
-f 561/561 492/492 557/557
-# f986...
-f 545/545 487/487 470/470
-f 554/554 492/492 545/545
-f 583/583 513/513 508/508
-f 583/583 289/289 486/486
-f 562/562 486/486 289/289
-# f991...
-f 513/513 397/397 508/508
-f 649/649 243/243 247/247
-f 513/513 42/42 397/397
-f 407/407 128/128 382/382
-f 583/583 486/486 513/513
-# f996...
-f 679/679 373/373 228/228
-f 562/562 295/295 486/486
-f 562/562 557/557 295/295
-f 538/538 513/513 486/486
-f 538/538 42/42 513/513
-# f1001...
-f 421/421 187/187 294/294
-f 670/670 99/99 102/102
-f 557/557 492/492 295/295
-f 465/465 51/51 463/463
-f 463/463 51/51 377/377
-# f1006...
-f 465/465 248/248 51/51
-f 532/532 397/397 42/42
-f 248/248 91/91 51/51
-f 663/663 517/517 484/484
-f 558/558 538/538 486/486
-# f1011...
-f 538/538 532/532 42/42
-f 256/256 106/106 43/43
-f 675/675 239/239 288/288
-f 554/554 288/288 239/239
-f 230/230 89/89 228/228
-# f1016...
-f 272/272 89/89 230/230
-f 675/675 502/502 549/549
-f 675/675 549/549 239/239
-f 568/568 554/554 239/239
-f 568/568 492/492 554/554
-# f1021...
-f 547/547 295/295 492/492
-f 569/569 492/492 568/568
-f 569/569 547/547 492/492
-f 558/558 486/486 295/295
-f 525/525 2/2 467/467
-# f1026...
-f 373/373 230/230 228/228
-f 558/558 295/295 547/547
-f 558/558 364/364 538/538
-f 587/587 467/467 369/369
-f 524/524 369/369 467/467
-# f1031...
-f 736/736 700/700 724/724
-f 538/538 505/505 231/231
-f 538/538 364/364 505/505
-f 538/538 231/231 532/532
-f 558/558 547/547 364/364
-# f1036...
-f 527/527 500/500 282/282
-f 527/527 294/294 526/526
-f 526/526 294/294 187/187
-f 520/520 499/499 500/500
-f 573/573 239/239 549/549
-# f1041...
-f 254/254 91/91 248/248
-f 568/568 239/239 495/495
-f 569/569 568/568 495/495
-f 500/500 307/307 282/282
-f 679/679 228/228 365/365
-# f1046...
-f 559/559 496/496 511/511
-f 547/547 495/495 364/364
-f 569/569 495/495 547/547
-f 682/682 248/248 465/465
-f 574/574 496/496 550/550
-# f1051...
-f 624/624 369/369 524/524
-f 572/572 553/553 559/559
-f 495/495 277/277 364/364
-f 505/505 364/364 277/277
-f 500/500 272/272 230/230
-# f1056...
-f 574/574 394/394 309/309
-f 553/553 551/551 550/550
-f 576/576 361/361 521/521
-f 725/725 573/573 376/376
-f 527/527 190/190 520/520
-# f1061...
-f 510/510 402/402 369/369
-f 488/488 291/291 303/303
-f 527/527 526/526 190/190
-f 548/548 417/417 516/516
-f 573/573 24/24 239/239
-# f1066...
-f 505/505 277/277 231/231
-f 421/421 405/405 187/187
-f 528/528 309/309 313/313
-f 139/139 30/30 48/48
-f 456/456 100/100 26/26
-# f1071...
-f 594/594 525/525 589/589
-f 719/719 531/531 652/652
-f 725/725 582/582 573/573
-f 534/534 231/231 277/277
-f 572/572 359/359 543/543
-# f1076...
-f 498/498 421/421 294/294
-f 495/495 239/239 315/315
-f 495/495 315/315 277/277
-f 365/365 61/61 175/175
-f 575/575 417/417 304/304
-# f1081...
-f 377/377 65/65 268/268
-f 582/582 24/24 573/573
-f 315/315 239/239 24/24
-f 534/534 277/277 315/315
-f 510/510 423/423 402/402
-# f1086...
-f 624/624 14/14 484/484
-f 624/624 497/497 510/510
-f 427/427 46/46 80/80
-f 582/582 566/566 24/24
-f 427/427 268/268 46/46
-# f1091...
-f 624/624 484/484 497/497
-f 534/534 473/473 231/231
-f 433/433 377/377 268/268
-f 577/577 534/534 315/315
-f 433/433 268/268 427/427
-# f1096...
-f 351/351 241/241 175/175
-f 702/702 639/639 566/566
-f 566/566 556/556 24/24
-f 577/577 315/315 24/24
-f 504/504 378/378 399/399
-# f1101...
-f 639/639 556/556 566/566
-f 577/577 489/489 473/473
-f 577/577 473/473 534/534
-f 533/533 6/6 484/484
-f 666/666 378/378 504/504
-# f1106...
-f 639/639 564/564 556/556
-f 556/556 183/183 24/24
-f 577/577 24/24 183/183
-f 533/533 484/484 517/517
-f 578/578 533/533 517/517
-# f1111...
-f 504/504 399/399 494/494
-f 658/658 393/393 564/564
-f 564/564 393/393 556/556
-f 577/577 183/183 489/489
-f 382/382 143/143 358/358
-# f1116...
-f 494/494 316/316 71/71
-f 504/504 494/494 71/71
-f 658/658 581/581 393/393
-f 556/556 393/393 183/183
-f 578/578 517/517 49/49
-# f1121...
-f 281/281 25/25 20/20
-f 579/579 281/281 20/20
-f 658/658 645/645 567/567
-f 493/493 183/183 393/393
-f 592/592 578/578 49/49
-# f1126...
-f 666/666 79/79 64/64
-f 79/79 25/25 64/64
-f 291/291 20/20 25/25
-f 567/567 514/514 544/544
-f 493/493 393/393 278/278
-# f1131...
-f 493/493 489/489 183/183
-f 592/592 536/536 578/578
-f 578/578 536/536 533/533
-f 536/536 435/435 533/533
-f 498/498 466/466 381/381
-# f1136...
-f 489/489 342/342 424/424
-f 504/504 71/71 5/5
-f 666/666 504/504 5/5
-f 579/579 20/20 488/488
-f 579/579 488/488 514/514
-# f1141...
-f 567/567 544/544 318/318
-f 581/581 567/567 318/318
-f 581/581 278/278 393/393
-f 506/506 489/489 493/493
-f 666/666 5/5 79/79
-# f1146...
-f 543/543 493/493 278/278
-f 543/543 506/506 493/493
-f 510/510 497/497 423/423
-f 316/316 301/301 71/71
-f 488/488 20/20 291/291
-# f1151...
-f 544/544 518/518 318/318
-f 436/436 78/78 62/62
-f 527/527 520/520 500/500
-f 536/536 503/503 435/435
-f 530/530 466/466 498/498
-# f1156...
-f 482/482 79/79 5/5
-f 501/501 25/25 79/79
-f 501/501 291/291 25/25
-f 613/613 610/610 322/322
-f 718/718 694/694 690/690
-# f1161...
-f 656/656 563/563 522/522
-f 563/563 262/262 522/522
-f 588/588 358/358 357/357
-f 735/735 262/262 287/287
-f 725/725 721/721 698/698
-# f1166...
-f 623/623 610/610 613/613
-f 590/590 350/350 392/392
-f 590/590 86/86 350/350
-f 326/326 323/323 280/280
-f 592/592 503/503 536/536
-# f1171...
-f 597/597 86/86 590/590
-f 597/597 590/590 595/595
-f 597/597 43/43 86/86
-f 629/629 584/584 580/580
-f 595/595 590/590 468/468
-# f1176...
-f 598/598 597/597 595/595
-f 598/598 43/43 597/597
-f 595/595 468/468 592/592
-f 595/595 592/592 593/593
-f 598/598 595/595 593/593
-# f1181...
-f 599/599 43/43 598/598
-f 593/593 592/592 49/49
-f 703/703 599/599 601/601
-f 644/644 599/599 598/598
-f 644/644 601/601 599/599
-# f1186...
-f 705/705 523/523 656/656
-f 731/731 619/619 120/120
-f 719/719 283/283 213/213
-f 701/701 695/695 652/652
-f 733/733 703/703 601/601
-# f1191...
-f 733/733 633/633 703/703
-f 730/730 716/716 636/636
-f 300/300 113/113 63/63
-f 736/736 704/704 290/290
-f 630/630 602/602 45/45
-# f1196...
-f 644/644 598/598 636/636
-f 733/733 603/603 605/605
-f 630/630 609/609 602/602
-f 587/587 586/586 358/358
-f 86/86 43/43 22/22
-# f1201...
-f 633/633 605/605 611/611
-f 646/646 614/614 630/630
-f 646/646 611/611 614/614
-f 630/630 614/614 609/609
-f 606/606 605/605 603/603
-# f1206...
-f 608/608 605/605 606/606
-f 611/611 605/605 608/608
-f 614/614 491/491 609/609
-f 606/606 285/285 604/604
-f 608/608 606/606 604/604
-# f1211...
-f 604/604 285/285 251/251
-f 615/615 614/614 608/608
-f 614/614 611/611 608/608
-f 615/615 491/491 614/614
-f 604/604 251/251 425/425
-# f1216...
-f 615/615 608/608 612/612
-f 612/612 608/608 604/604
-f 624/624 510/510 369/369
-f 674/674 99/99 670/670
-f 636/636 598/598 110/110
-# f1221...
-f 697/697 113/113 275/275
-f 402/402 382/382 369/369
-f 587/587 369/369 586/586
-f 732/732 728/728 720/720
-f 663/663 484/484 14/14
-# f1226...
-f 723/723 186/186 63/63
-f 586/586 369/369 382/382
-f 588/588 525/525 587/587
-f 533/533 435/435 456/456
-f 399/399 378/378 95/95
-# f1231...
-f 628/628 378/378 540/540
-f 628/628 95/95 378/378
-f 666/666 317/317 378/378
-f 654/654 631/631 481/481
-f 632/632 481/481 631/631
-# f1236...
-f 650/650 481/481 632/632
-f 650/650 632/632 429/429
-f 658/658 229/229 429/429
-f 655/655 634/634 428/428
-f 711/711 580/580 535/535
-# f1241...
-f 625/625 110/110 49/49
-f 451/451 64/64 25/25
-f 702/702 648/648 229/229
-f 587/587 525/525 467/467
-f 664/664 650/650 657/657
-# f1246...
-f 657/657 650/650 429/429
-f 657/657 429/429 108/108
-f 654/654 317/317 64/64
-f 654/654 64/64 631/631
-f 642/642 638/638 626/626
-# f1251...
-f 647/647 540/540 481/481
-f 645/645 429/429 632/632
-f 646/646 630/630 642/642
-f 646/646 642/642 626/626
-f 658/658 429/429 645/645
-# f1256...
-f 549/549 502/502 376/376
-f 703/703 633/633 626/626
-f 658/658 564/564 229/229
-f 623/623 600/600 610/610
-f 593/593 49/49 110/110
-# f1261...
-f 654/654 540/540 317/317
-f 726/726 643/643 655/655
-f 540/540 378/378 317/317
-f 702/702 566/566 582/582
-f 422/422 259/259 415/415
-# f1266...
-f 726/726 655/655 717/717
-f 686/686 438/438 439/439
-f 733/733 601/601 603/603
-f 643/643 625/625 634/634
-f 647/647 481/481 430/430
-# f1271...
-f 727/727 256/256 715/715
-f 642/642 94/94 638/638
-f 664/664 430/430 481/481
-f 542/542 453/453 36/36
-f 539/539 509/509 537/537
-# f1276...
-f 664/664 657/657 642/642
-f 709/709 636/636 110/110
-f 506/506 342/342 489/489
-f 678/678 675/675 470/470
-f 680/680 660/660 91/91
-# f1281...
-f 663/663 14/14 622/622
-f 648/648 94/94 108/108
-f 664/664 481/481 650/650
-f 666/666 64/64 317/317
-f 634/634 622/622 428/428
-# f1286...
-f 719/719 711/711 531/531
-f 300/300 249/249 275/275
-f 663/663 49/49 517/517
-f 656/656 623/623 563/563
-f 621/621 579/579 567/567
-# f1291...
-f 640/640 428/428 622/622
-f 724/724 305/305 250/250
-f 429/429 229/229 108/108
-f 645/645 632/632 621/621
-f 663/663 625/625 49/49
-# f1296...
-f 734/734 721/721 502/502
-f 654/654 481/481 540/540
-f 635/635 110/110 625/625
-f 580/580 539/539 535/535
-f 537/537 509/509 523/523
-# f1301...
-f 663/663 622/622 625/625
-f 648/648 108/108 229/229
-f 646/646 633/633 611/611
-f 644/644 636/636 601/601
-f 655/655 643/643 634/634
-# f1306...
-f 621/621 281/281 579/579
-f 634/634 625/625 622/622
-f 621/621 451/451 281/281
-f 657/657 108/108 94/94
-f 451/451 25/25 281/281
-# f1311...
-f 702/702 229/229 639/639
-f 656/656 523/523 623/623
-f 643/643 635/635 625/625
-f 589/589 588/588 339/339
-f 735/735 701/701 705/705
-# f1316...
-f 732/732 698/698 728/728
-f 712/712 704/704 480/480
-f 712/712 480/480 596/596
-f 733/733 605/605 633/633
-f 584/584 541/541 580/580
-# f1321...
-f 662/662 14/14 624/624
-f 736/736 480/480 704/704
-f 712/712 596/596 594/594
-f 596/596 525/525 594/594
-f 539/539 537/537 535/535
-# f1326...
-f 623/623 523/523 552/552
-f 596/596 480/480 2/2
-f 723/723 113/113 710/710
-f 665/665 2/2 480/480
-f 596/596 2/2 525/525
-# f1331...
-f 589/589 525/525 588/588
-f 632/632 631/631 451/451
-f 579/579 514/514 567/567
-f 641/641 617/617 109/109
-f 665/665 480/480 109/109
-# f1336...
-f 537/537 531/531 535/535
-f 665/665 467/467 2/2
-f 368/368 280/280 310/310
-f 646/646 626/626 633/633
-f 602/602 430/430 45/45
-# f1341...
-f 617/617 616/616 109/109
-f 665/665 109/109 616/616
-f 686/686 684/684 438/438
-f 573/573 549/549 376/376
-f 647/647 602/602 628/628
-# f1346...
-f 731/731 641/641 653/653
-f 731/731 617/617 641/641
-f 659/659 616/616 617/617
-f 665/665 616/616 637/637
-f 637/637 524/524 467/467
-# f1351...
-f 665/665 637/637 467/467
-f 726/726 635/635 643/643
-f 647/647 430/430 602/602
-f 598/598 593/593 110/110
-f 629/629 487/487 584/584
-# f1356...
-f 674/674 434/434 99/99
-f 737/737 713/713 629/629
-f 734/734 678/678 690/690
-f 678/678 284/284 675/675
-f 734/734 284/284 678/678
-# f1361...
-f 652/652 531/531 537/537
-f 689/689 687/687 254/254
-f 660/660 175/175 270/270
-f 726/726 717/717 697/697
-f 716/716 285/285 603/603
-# f1366...
-f 680/680 679/679 660/660
-f 685/685 373/373 679/679
-f 679/679 175/175 660/660
-f 685/685 679/679 680/680
-f 685/685 672/672 373/373
-# f1371...
-f 685/685 680/680 91/91
-f 297/297 240/240 37/37
-f 685/685 91/91 254/254
-f 687/687 685/685 254/254
-f 688/688 685/685 687/687
-# f1376...
-f 688/688 672/672 685/685
-f 688/688 668/668 672/672
-f 672/672 668/668 240/240
-f 668/668 651/651 240/240
-f 651/651 37/37 240/240
-# f1381...
-f 676/676 37/37 651/651
-f 688/688 620/620 668/668
-f 668/668 620/620 651/651
-f 676/676 651/651 460/460
-f 691/691 445/445 460/460
-# f1386...
-f 407/407 382/382 402/402
-f 689/689 688/688 687/687
-f 730/730 709/709 697/697
-f 330/330 41/41 57/57
-f 330/330 4/4 41/41
-# f1391...
-f 691/691 686/686 479/479
-f 689/689 671/671 688/688
-f 688/688 671/671 620/620
-f 651/651 620/620 258/258
-f 669/669 460/460 651/651
-# f1396...
-f 691/691 460/460 669/669
-f 669/669 651/651 258/258
-f 203/203 158/158 139/139
-f 171/171 72/72 9/9
-f 681/681 171/171 9/9
-# f1401...
-f 689/689 248/248 682/682
-f 681/681 131/131 171/171
-f 676/676 388/388 37/37
-f 672/672 240/240 297/297
-f 673/673 620/620 671/671
-# f1406...
-f 673/673 258/258 620/620
-f 691/691 669/669 686/686
-f 672/672 297/297 373/373
-f 684/684 669/669 258/258
-f 686/686 669/669 684/684
-# f1411...
-f 714/714 260/260 698/698
-f 689/689 674/674 671/671
-f 674/674 673/673 671/671
-f 689/689 682/682 674/674
-f 674/674 670/670 673/673
-# f1416...
-f 684/684 258/258 215/215
-f 684/684 215/215 438/438
-f 729/729 582/582 725/725
-f 682/682 434/434 674/674
-f 692/692 258/258 673/673
-# f1421...
-f 692/692 215/215 258/258
-f 600/600 552/552 310/310
-f 692/692 673/673 670/670
-f 683/683 78/78 215/215
-f 692/692 670/670 661/661
-# f1426...
-f 692/692 683/683 215/215
-f 446/446 397/397 391/391
-f 670/670 667/667 661/661
-f 692/692 661/661 681/681
-f 692/692 681/681 683/683
-# f1431...
-f 265/265 252/252 247/247
-f 677/677 661/661 667/667
-f 683/683 681/681 9/9
-f 681/681 661/661 677/677
-f 305/305 299/299 245/245
-# f1436...
-f 725/725 502/502 721/721
-f 677/677 667/667 182/182
-f 610/610 600/600 607/607
-f 689/689 254/254 248/248
-f 610/610 607/607 323/323
-# f1441...
-f 477/477 28/28 87/87
-f 713/713 690/690 678/678
-f 623/623 552/552 600/600
-f 676/676 460/460 388/388
diff --git a/sandbox/springborn/cathead.obj b/sandbox/springborn/cathead.obj
deleted file mode 100644
index f05cfd5..0000000
--- a/sandbox/springborn/cathead.obj
+++ /dev/null
@@ -1,379 +0,0 @@
-v -0.206972 0.0740737 0.544664
-v -0.398695 -0.0740794 0.501089
-v -0.211327 -0.187367 0.588234
-v -0.511983 -0.235298 0.400872
-v -0.56863 0.0348535 0.405227
-v -0.35948 0.178646 0.50545
-v -0.525054 0.313721 0.387801
-v -0.189545 0.30065 0.544664
-v 0.124182 0.0740737 0.509805
-v -0.455336 -0.33987 0.544664
-v -0.411766 -0.427021 0.671024
-v -0.237476 -0.413949 0.745097
-v -0.250547 -0.535954 0.797389
-v -0.346403 -0.562097 0.758169
-v 0.0152491 -0.33116 0.531593
-v -0.106755 -0.496734 0.692812
-v -0.254903 -0.692812 0.749458
-v -0.0631798 -0.601311 0.55338
-v -0.14597 -0.666669 0.666669
-v -0.250547 -0.727671 0.583879
-v -0.198256 -0.714599 0.42266
-v 0.0283206 -0.514166 0.383445
-v -0.124182 -0.623099 0.196078
-v -0.285401 -0.692812 0.413944
-v -0.333331 -0.596956 0.226582
-v -0.333331 -0.418305 0.413944
-v 0.233115 -0.366019 0.313727
-v 0.215688 -0.156864 0.457519
-v -0.342048 -0.623099 -0.0915061
-v -0.708061 -0.431376 0.0697184
-v -0.647058 -0.501095 -0.0915061
-v -0.716777 -0.318088 0.169935
-v -0.699344 -0.143792 0.235292
-v -0.747275 0.00871052 0.235292
-v -0.747275 0.165574 0.191723
-v -0.764708 0.291939 0.12636
-v -0.747275 0.461874 0.0130715
-v -0.337692 0.535948 0.366013
-v -0.472768 0.644881 0.0653574
-v -0.272329 0.753814 0.0827899
-v -0.294117 0.797383 0.278868
-v -0.307188 0.801744 0.435731
-v -0.324621 0.779957 0.583879
-v -0.355119 0.714594 0.710238
-v -0.407405 0.59695 0.692812
-v -0.442264 0.505444 0.610022
-v -0.477123 0.413944 0.51416
-v -0.285401 0.509805 0.666669
-v -0.185184 0.605661 0.631809
-v -0.0326816 0.518516 0.479301
-v -0.198256 0.72331 0.575162
-v -0.124182 0.745097 0.278868
-v 0.189545 0.479301 0.357297
-v -0.0413921 0.675379 0.352942
-v -0.843136 -0.0392202 -0.0522859
-v -0.764708 -0.33116 0.0348592
-v -0.816994 -0.152508 -0.178651
-v -0.87364 -0.0522916 -0.187362
-v -0.816994 0.108933 -0.204794
-v -0.816994 0.25708 -0.00435526
-v -0.795206 0.387795 -0.0653574
-v -0.764708 0.440087 -0.152503
-v -0.642703 0.535948 -0.370368
-v -0.516338 0.636165 -0.21351
-v -0.856208 0.265791 -0.148147
-v -0.816994 0.261435 -0.291939
-v -0.847497 0.239648 -0.418299
-v -0.82571 0.265791 -0.479301
-v -0.912855 -0.0697184 -0.270152
-v -0.947714 0.0130715 -0.326799
-v -0.938998 0.0740737 -0.392156
-v -0.799567 -0.344231 -0.108933
-v -0.620916 -0.509805 -0.331154
-v -0.764708 -0.287584 -0.244009
-v -0.799567 -0.291939 -0.352942
-v -0.9085 -0.174296 -0.33987
-v -1 -0.0697184 -0.409588
-v -0.965141 -0.148153 -0.461874
-v -0.95643 -0.0610022 -0.549019
-v -0.978212 0.021782 -0.483662
-v -0.729848 -0.357302 -0.501089
-v -0.921571 -0.230937 -0.544664
-v -0.821354 -0.222227 -0.662308
-v -0.9085 -0.16558 -0.623093
-v -0.342048 -0.557736 -0.383445
-v -0.381262 -0.300656 -0.727671
-v -0.167757 -0.557736 -0.501089
-v -0.599128 -0.252725 -0.692812
-v -0.420482 -0.0697184 -0.797389
-v -0.14597 -0.610027 -0.631809
-v -0.947714 0.0915004 -0.522877
-v -0.891067 0.178646 -0.50545
-v -0.869279 -0.0697184 -0.705883
-v -0.934643 0.0348535 -0.627454
-v -0.847497 0.156858 -0.649236
-v -0.620916 0.235292 -0.701528
-v -0.559913 0.143786 -0.745097
-v -0.315905 0.278862 -0.753814
-v -0.0196101 0.440087 -0.784312
-v -0.211327 0.46623 -0.636165
-v -0.381262 0.505444 -0.579523
-v -0.647058 0.374724 -0.601305
-v -0.355119 0.653591 -0.344225
-v -0.0108939 0.644881 -0.313727
-v 0.163396 0.64052 0.104578
-v 0.433554 0.0697127 0.322443
-v 0.516344 -0.318088 0.0435754
-v 0.35948 -0.492378 -0.0653574
-v 0.185184 -0.535954 0.0305039
-v 0.0631798 -0.618738 -0.313727
-v 0.328976 -0.618738 -0.296295
-v 0.102394 -0.684101 -0.43137
-v 0.612199 -0.396517 -0.16558
-v 0.307188 0.522877 -0.779957
-v 0.163396 0.549019 -0.562091
-v 0.468413 0.400872 0.00871623
-v 0.599128 0.374724 -0.261435
-v 0.721132 0.357297 -0.50545
-v 0.843136 0.326793 -0.718955
-v 0.124182 -0.801744 -0.562091
-v 0.35948 -0.749458 -0.448803
-v 0.559913 0.0479307 0.161219
-v 0.673201 0.0304982 -0.0566469
-v 0.808283 0.0174267 -0.309366
-v 0.891067 -0.00871623 -0.483662
-v 1 -0.0697184 -0.753814
-v 0.355119 0.440087 0.191723
-v 0.694989 -0.58824 -0.440087
-v 0.886712 -0.230937 -0.457519
-v 0.912855 -0.366019 -0.575162
-v -0.921571 -0.126365 -0.300656
-f 1 2 3
-f 4 2 5
-f 2 1 5
-f 1 6 5
-f 6 7 5
-f 7 6 8
-f 6 1 8
-f 9 1 3
-f 3 4 10
-f 10 11 3
-f 11 12 3
-f 11 13 12
-f 13 11 14
-f 12 15 3
-f 15 12 16
-f 12 13 16
-f 13 17 16
-f 17 13 14
-f 16 18 15
-f 18 16 19
-f 16 17 19
-f 17 20 19
-f 20 21 19
-f 21 18 19
-f 18 21 22
-f 21 23 22
-f 21 24 23
-f 24 21 20
-f 24 25 23
-f 25 24 26
-f 24 20 26
-f 20 17 26
-f 17 14 26
-f 14 11 26
-f 11 10 26
-f 10 4 26
-f 3 15 9
-f 15 27 28
-f 23 25 29
-f 25 30 31
-f 30 25 32
-f 25 26 32
-f 4 33 32
-f 18 22 15
-f 22 27 15
-f 5 34 33
-f 34 5 35
-f 5 7 35
-f 7 36 35
-f 36 7 37
-f 7 38 37
-f 38 39 37
-f 39 38 40
-f 38 41 40
-f 41 38 42
-f 38 43 42
-f 43 38 44
-f 38 45 44
-f 45 38 46
-f 46 38 47
-f 38 7 47
-f 7 8 47
-f 8 46 47
-f 46 8 48
-f 8 49 48
-f 49 44 48
-f 44 45 48
-f 49 8 50
-f 49 51 44
-f 51 43 44
-f 43 51 42
-f 51 52 42
-f 52 41 42
-f 41 52 40
-f 53 54 50
-f 49 54 51
-f 54 49 50
-f 51 54 52
-f 50 9 53
-f 9 50 8
-f 55 33 34
-f 33 55 32
-f 55 56 32
-f 56 55 57
-f 55 58 57
-f 58 55 59
-f 55 60 59
-f 60 55 35
-f 55 34 35
-f 36 60 35
-f 60 36 37
-f 37 61 60
-f 61 37 62
-f 37 63 62
-f 63 37 64
-f 37 39 64
-f 39 40 64
-f 62 65 61
-f 65 62 66
-f 62 67 66
-f 67 62 68
-f 62 63 68
-f 65 59 60
-f 59 69 58
-f 69 59 70
-f 59 71 70
-f 71 59 67
-f 59 66 67
-f 59 65 66
-f 56 30 32
-f 30 56 31
-f 56 72 31
-f 72 56 57
-f 60 61 65
-f 46 48 45
-f 31 29 25
-f 29 31 73
-f 31 74 73
-f 74 31 72
-f 57 74 72
-f 74 57 75
-f 57 76 75
-f 57 58 69
-f 77 78 76
-f 78 77 79
-f 77 80 79
-f 80 77 71
-f 77 70 71
-f 70 77 69
-f 75 73 74
-f 73 75 81
-f 75 82 81
-f 82 75 76
-f 82 83 81
-f 83 82 84
-f 82 79 84
-f 79 82 78
-f 82 76 78
-f 73 85 29
-f 85 73 86
-f 73 81 86
-f 85 87 29
-f 87 85 86
-f 88 86 81
-f 86 88 89
-f 88 83 89
-f 83 88 81
-f 86 90 87
-f 71 91 80
-f 91 71 92
-f 71 67 92
-f 67 68 92
-f 79 93 84
-f 93 79 94
-f 79 91 94
-f 91 79 80
-f 92 95 91
-f 92 68 95
-f 91 95 94
-f 95 93 94
-f 93 95 96
-f 95 68 96
-f 93 83 84
-f 83 93 89
-f 93 97 89
-f 97 93 96
-f 89 97 98
-f 98 100 99
-f 100 98 101
-f 98 96 101
-f 98 97 96
-f 102 68 63
-f 68 102 96
-f 102 101 96
-f 101 102 63
-f 64 103 63
-f 103 64 40
-f 103 101 63
-f 101 104 100
-f 104 101 103
-f 40 104 103
-f 40 52 104
-f 52 105 104
-f 9 106 53
-f 106 9 28
-f 106 27 107
-f 27 106 28
-f 27 108 107
-f 108 27 22
-f 22 109 108
-f 109 22 23
-f 109 110 108
-f 110 109 23
-f 23 29 110
-f 110 111 108
-f 111 110 112
-f 110 90 112
-f 90 110 87
-f 110 29 87
-f 108 111 113
-f 108 113 107
-f 114 99 115
-f 99 104 115
-f 104 105 115
-f 116 117 115
-f 117 118 115
-f 115 118 114
-f 118 119 114
-f 120 112 90
-f 112 120 111
-f 120 121 111
-f 99 100 104
-f 2 4 3
-f 5 33 4
-f 116 122 123
-f 123 117 116
-f 117 123 124
-f 117 124 118
-f 124 125 118
-f 125 119 118
-f 119 125 126
-f 122 106 107
-f 105 116 115
-f 54 53 105
-f 52 54 105
-f 105 127 116
-f 122 116 127
-f 106 122 127
-f 53 127 105
-f 121 128 113
-f 121 113 111
-f 113 128 124
-f 128 129 124
-f 129 128 130
-f 107 113 122
-f 113 123 122
-f 123 113 124
-f 1 9 8
-f 9 15 28
-f 4 32 26
-f 106 127 53
-f 57 131 76
-f 131 77 76
-f 69 131 57
-f 131 69 77
-f 129 125 124
-f 125 130 126
-f 130 125 129
diff --git a/sandbox/springborn/dcflatten.m b/sandbox/springborn/dcflatten.m
deleted file mode 100644
index 042b972..0000000
--- a/sandbox/springborn/dcflatten.m
+++ /dev/null
@@ -1,511 +0,0 @@
-function [f, v, vt, u] = dcflatten(inobj, outobj)
-%DCFLATTEN Flatten a 3D surface mesh discrete-conformally.
-%   [f, v, vt, u] = dcflatten(inobj) reads the file named inobj in
-%   alias/wavefront obj format and flattens it. Only lines beginning with
-%   'v ' or 'f ' are read, all other lines are ignored. The input mesh must
-%   be a triangulated surface which is a topological disc. The triangles 
-%   must be consistently oriented. Edges with length 0 are not allowed.
-%
-%   [f, v, vt, u] = dcflatten(inobj, outobj) writes the flat mesh as
-%   texture coordinates to outobj. Note that only f-lines, v-lines and
-%   vt-lines are written to outobj. All other data that might be contained 
-%   in inobj (such as normals) are not copied to outobj.
-% 
-%   The return values are:
-%
-%   f : an array of dimension (number of triangles) x 3. 
-%       f(m,n) is the index of the nth vertex in the mth triangle.
-%   v : an array of dimension (number of vertices) x 3.
-%       v(m,:) are the coordinates of the mth vertex of the original mesh.
-%   vt: an array of dimension (number of vertices) x 2.
-%       v(m,:) are the coordinates of the mth vertex of the flattened mesh.
-%   u : a vector of length (number of vertices).
-%       u(m) is the log scale factor at vertex number m. If an edge between
-%       vertices m and n has lenght l in the original mesh, then it has
-%       length l * exp(u(m) + u(n)) in the flat mesh.
-
-if ((nargin < 1) || (nargin > 2))
-    error('One or two file names must be given as argument.');
-end
-
-% load mesh
-fprintf(1, '\nloading mesh ...');
-[f, v] = loaddotobj(inobj);
-fprintf(1, ' done. ');
-
-% count and display number of faces and vertices (and number of angles)
-numfaces = size(f, 1);
-numangles = 3 * numfaces;
-numvertices = size(v, 1);
-fprintf(1, '%u faces, %u vertices.\n', numfaces, numvertices);
-
-% show mesh
-figure();
-patch('Vertices', v, 'Faces', f, 'FaceColor', [0.9 0.9 0.9]);
-axis equal;
-axis off;
-axis vis3d;
-
-% calculate array loglength of same dimensions as f
-% loglength(m, n) is the length of the edge of triangle m opposite
-% its nth vertex (n = 1,2,3). 
-loglength = zeros(numfaces, 3);
-for n = 1: numfaces
-    edgevec = [0 -1 1; 1 0 -1; -1 1 0] * v(f(n, :), :);
-    loglength(n, :) = reallog([norm(edgevec(1,:)), norm(edgevec(2,:)), norm(edgevec(3,:))]);
-end
-
-% Calculate the (directed) adjacency matrix. adjacencymatrix(m,n) = 1 if the oriented
-% boundary of a triangle contains the directed edge from vertex m to vertex
-% n, and 0 otherwise. This matrix is not quite symmetric due to boundary edges.
-adjacencymatrix = sparse([f(:,1); f(:,2); f(:,3)], ...
-                         [f(:,2); f(:,3); f(:,1)], ...
-    	                 ones(3 * numfaces, 1), ...
-                         numvertices, numvertices, 3 * numfaces);
-if any(any(adjacencymatrix > 1))
-    error('Triangles must be oriented consistently.')
-end
-% Use adjacencymatrix to find the boundaryvertices.
-boundaryvertices = any(adjacencymatrix ~= adjacencymatrix', 2);
-% adjacencymatrix is not needed anymore.
-clear adjacencymatrix;
-interiorvertices = ~boundaryvertices;
-fprintf('%u boundary vertices, %u interior vertices.\n', nnz(boundaryvertices), nnz(interiorvertices));
-
-% u_per_triangle is a (3 * numfaces) by numvertices matrix which is used to
-% distribute the u-values. u_per_triangles(m, n) is 1 if f(m) == n, otherwise 0. 
-% (Here, f is indexed as linear vector.)
-u_per_triangle = sparse(1 : numangles, f(:), ones(numangles,1), numangles, numvertices, numangles);
-% Allocate numfaces by 3 matrices which are used in dcfunctional.
-upt = zeros(numfaces, 3);
-angles = zeros(numfaces, 3);
-ct = zeros(numfaces, 3);
-
-% The following variables are used for the statistics that outfun displays.
-numbrokentriangs = uint32(0);
-thisfunctionvalue = 0;
-lastfunctionvalue = 0;
-
-% The discrete conformal functional with gradient and hessian.
-    function [val, grad, hess] = dcfunctional(u)
-        % Cout broken triangs for the statistics.
-        numbrokentriangs = 0;
-        % upt(m,n) is the u-value of the nth vertex in triangle n.
-        upt(:) = u_per_triangle * u;
-        % newloglenth(m,n) is the new logarithmic length of the edge
-        % opposite the nth vertex in the mth triangle.
-        newloglength = loglength + upt(:, [2, 3, 1]) + upt(:, [3, 1, 2]);
-        % angles(m,n) is the angle at the nth vertex of the mth triangle.
-        % ct(m,n) is the corresponding cotan (or zero if triangle is
-        % broken).
-        [angles(:, 1), angles(:, 2), angles(:, 3), ct(:, 1), ct(:, 2), ct(:, 3)] = ...
-            arrayfun(@triangle_angles, newloglength(:,1), newloglength(:,2), newloglength(:,3));
-        % Calculate the value of the functional.
-        val = 2 * pi * sum(u) + -pi * sum(upt(:)) + sum(angles(:) .* newloglength(:)) + 0.5 * sum(clausen(2 * angles(:)));
-        % Bookkeeping for the statistics
-        lastfunctionvalue = thisfunctionvalue;
-        thisfunctionvalue = val;
-        % Calculate the gradient.
-        grad = 2 * pi - (u_per_triangle' * angles(:));
-        % Build the Hessian.
-        ii = [ f(:, 1);  f(:, 2); f(:, 3); f(:, 1); f(:, 2); f(:, 2); f(:, 3); f(:, 3); f(:, 1)];
-        jj = [ f(:, 1);  f(:, 2); f(:, 3); f(:, 2); f(:, 1); f(:, 3); f(:, 2); f(:, 1); f(:, 3)];
-        hh = [ct(:, 2) + ct(:, 3); ...
-            ct(:, 3) + ct(:, 1); ...
-            ct(:, 1) + ct(:, 2); ...
-            -ct(:, 3); ...
-            -ct(:, 3); ...
-            -ct(:, 1); ...
-            -ct(:, 1); ...
-            -ct(:, 2); ...
-            -ct(:, 2)];
-        hess = sparse(ii, jj, hh, numvertices, numvertices);
-    end
-
-    function [alpha, beta, gamma, cota, cotb, cotc] = triangle_angles(loga, logb, logc)
-        a = exp(loga);
-        b = exp(logb);
-        c = exp(logc);
-        s0 =  a + b + c;
-        s1 = -a + b + c;
-        s2 =  a - b + c;
-        s3 =  a + b - c;
-        if s1 <= 0 || s2 <= 0 || s3 <= 0
-            numbrokentriangs = numbrokentriangs + uint32(1);
-            alpha = pi * (s1 <= 0);
-            beta  = pi * (s2 <= 0);
-            gamma = pi * (s3 <= 0);
-            cota = 0;
-            cotb = 0;
-            cotc = 0;
-            return;
-        end
-        alpha = 2 * atan(realsqrt(s2 * s3 / (s1 * s0)));
-        beta  = 2 * atan(realsqrt(s3 * s1 / (s2 * s0)));
-        gamma = 2 * atan(realsqrt(s1 * s2 / (s3 * s0)));
-        p = 0.5 / realsqrt(s1 * s2 * s3 * s0);
-        cota = p * (s1 * s0 - s2 * s3);
-        cotb = p * (s2 * s0 - s3 * s1);
-        cotc = p * (s3 * s0 - s1 * s2);
-    end
-
-% allocate vector u used in targetfunction.
-u = zeros(numvertices, 1);
-
-    % Clip boundaryvertices out of dcfunctional.
-    function [y, g, h] = targetfunction(x)
-        u(interiorvertices) = x;
-        [y, g, h] = dcfunctional(u);
-        g(boundaryvertices) = [];
-        h(:, boundaryvertices) = [];
-        h(boundaryvertices, :) = [];
-    end
-
-% Prepare for the minimization.
-xstart = zeros(nnz(interiorvertices), 1);
-tolgrad = 1e-6;
-
-    % Output function which displays statistics and provides stopping criterion.
-    function stop = outfun(x, optimValues, state)
-        stop = false;
-        switch state
-            case 'init'
-                fprintf(1, '\n          func value    inf norm of                       broken       cg\n');  
-                fprintf(1,   'iter       increase      gradient      max x    min x    triangles    iter\n\n');
-            case 'iter'
-                fprintf('%4u    %12g    %11g    %5.1g    %5.1g    %5u       %4u\n', ...
-                        optimValues.iteration, ...
-                        thisfunctionvalue - lastfunctionvalue, ...
-                        optimValues.firstorderopt, ...
-                        max(x), ...
-                        min(x), ...
-                        numbrokentriangs, ...
-                        optimValues.cgiterations);
-                if (norm(optimValues.gradient, Inf) <= tolgrad)
-                    stop = true;
-                    fprintf(1, 'Max norm of gradient <= %g.\n\n', tolgrad);
-                end
-        end
-    end
-
-% Set optimization options. TolFun and TolX are set to 0 because stopping
-% criterion is provided by outfun.
-options = optimset(...
-    'GradObj', 'on', ...
-    'Hessian', 'on', ...
-    'LargeScale', 'on', ...
-    'DerivativeCheck', 'off', ...
-    'FunValCheck', 'on', ...
-    'TolFun', 0.0, ...
-    'TolX', 0, ... 
-    'TolPCG', 1.0e-3, ...
-    'PrecondBandWidth', Inf, ...
-    'OutputFcn', @outfun, ...
-    'Display', 'off', ...
-    'Diagnostics', 'off');
-% Minimize!
-[xsol] = fminunc(@targetfunction, xstart, options); 
-u(interiorvertices) = xsol;
-
-% Don't need these anymore.
-clear upt u_per_triangle angles ct
-
-% Lay out the flat mesh.
-fprintf(1, 'laying out flattened mesh ... ');
-% triangforedge(m, n) is the triang containing directed edge from vertex m
-% to vertex n, or 0 if no such edge exists.
-triangforedge = sparse([f(:,1), f(:,2), f(:,3)], ...
-                       [f(:,2), f(:,3), f(:,1)], ...
-                       [1:numfaces, 1:numfaces, 1:numfaces], numvertices, numvertices, 3 * numfaces);
-% edgelength(m, n) is the length of directed edge from vertex m to n.
-edgelength = sparse([f(:,1); f(:,2); f(:,3)], ...
-                    [f(:,2); f(:,3); f(:,1)], ...
-                    exp([loglength(:, 3) + u(f(:, 1)) + u(f(:, 2)); ...
-                         loglength(:, 1) + u(f(:, 2)) + u(f(:, 3)); ...
-                         loglength(:, 2) + u(f(:, 3)) + u(f(:, 1))]));
-% Allocate vt for vertex coordinates of flat mesh. Third coordinate is
-% zero. It is there because this facilitates displaying the flat mesh.
-vt = zeros(numvertices, 3);
-% edgeslopte(m, n) is to hold the slope angle of directed edge from vertex
-% m to n.
-edgeslope = double(triangforedge | triangforedge'); % sparse matrix with given sparsity pattern.                     
-
-traversedualspanningtree(@travroot, @travleft, @travright);
-
-    function traversedualspanningtree(traverserootedge, traverseleftedge, traverserightedge)
-        % init edge queue
-        edgequeue.size = numfaces;
-        edgequeue.data = zeros([2, numfaces], 'uint32');
-        edgequeue.i1 = uint32(0);
-        edgequeue.i2 = uint32(0);
-
-        function pushedge(edge)
-            if edgequeue.i2 - edgequeue.i1 >= edgequeue.size
-                error('Edge queue is full.');
-            end
-            edgequeue.data(:, mod(edgequeue.i2, edgequeue.size) + 1) = edge;
-            edgequeue.i2 = edgequeue.i2 + 1;
-        end
-
-        function edge = popedge()
-            if edgequeue.i1 == edgequeue.i2
-                error('Edge queue is empty.');
-            end
-            edge = edgequeue.data(:, edgequeue.i1 + 1);
-            edgequeue.i1 = edgequeue.i1 + 1;
-            if edgequeue.i1 >= edgequeue.size
-                edgequeue.i1 = edgequeue.i1 - edgequeue.size;
-                edgequeue.i2 = edgequeue.i2 - edgequeue.size;
-            end
-        end
-
-        facetag = false(numfaces, 1);
-        roottriang = uint32(1);
-        rootedge = f(roottriang, [1,2]);
-        facetag(roottriang) = true;
-        pushedge(rootedge);
-        traverserootedge(rootedge);
-        oppedge = rootedge([2,1]);
-        oppface = triangforedge(oppedge(1), oppedge(2));
-        if (oppface > 0)
-            facetag(oppface) = true;
-            pushedge(oppedge);
-        end
-
-        while edgequeue.i1 ~= edgequeue.i2 % edge queue not empty
-            edge = popedge();
-            face = triangforedge(edge(1), edge(2));
-            switch f(face, 1)
-                case edge(1)
-                    v3 = f(face, 3);
-                case edge(2)
-                    v3 = f(face, 2);
-                otherwise
-                    v3 = f(face, 1);
-            end
-            leftedge = [edge(1); v3];
-            leftface = triangforedge(leftedge(1), leftedge(2));
-            rightedge = [v3; edge(2)];
-            rightface = triangforedge(rightedge(1), rightedge(2));
-            if (leftface > 0 && ~facetag(leftface))
-                facetag(leftface) = true;
-                pushedge(leftedge);
-            end
-            traverseleftedge(leftedge, edge);
-            if (rightface > 0 && ~facetag(rightface))
-                facetag(rightface) = true;
-                pushedge(rightedge);
-            end
-            traverserightedge(rightedge, edge);
-        end
-    end
-
-    function travroot(edge)
-        i1 = edge(1);
-        i2 = edge(2);
-        edgeslope(i1, i2) = 0;
-        edgeslope(i2, i1) = pi;
-        x = edgelength(i1, i2);
-        vt(edge, :) = [0, 0, 0; 
-                       x, 0, 0];
-    end
-
-    function travleft(edge2, edge1)
-        i1 = edge1(1);
-        i2 = edge1(2);
-        i3 = edge2(2);
-
-        c = full(edgelength(i1, i2)); % without the full, realsqrt below complains.
-        a = full(edgelength(i2, i3));
-        b = full(edgelength(i3, i1));
-        alpha = 2 * atan(realsqrt(max((a - b + c) * (a + b - c) / ((-a + b + c) * (a + b + c)), 0)));
-        slope = edgeslope(i1, i2) + alpha;
-        edgeslope(i1, i3) = slope;
-        edgeslope(i3, i1) = slope - pi;
-        vt(i3, :) = vt(i1, :) + b * [cos(slope), sin(slope), 0];
-    end
-
-    function travright(edge2, edge1)
-        i1 = edge1(1);
-        i2 = edge1(2);
-        i3 = edge2(1);
-
-        c = full(edgelength(i1, i2)); % without the full, realsqrt below complains.
-        a = full(edgelength(i2, i3));
-        b = full(edgelength(i3, i1));
-        beta = 2 * atan(realsqrt(max((-a + b + c) * (a + b - c) / ((a - b + c) * (a + b + c)), 0)));
-        slope = edgeslope(i1, i2) - beta;
-        edgeslope(i3, i2) = slope;
-        edgeslope(i2, i3) = slope + pi;
-        vt(i3, :) = vt(i2, :) - a * [cos(slope), sin(slope), 0];
-    end
-
-fprintf(1, 'done.\n');
-
-% Show the flattened mesh.
-figure();
-patch('Vertices', vt, 'Faces', f, 'FaceColor', [0.9 0.9 0.9]);
-axis equal;
-axis off;
-axis vis3d;  
-
-% Don't need the 3rd vt coordinate any longer.
-vt(:,3) = [];
-
-% Write output obj file if 2nd filename was given as argument.
-if (nargin == 2) 
-    fprintf(1, ['Writing ', outobj, ' ... ']);
-    outfile = fopen(outobj, 'w');
-    for n = 1:numvertices
-        fprintf(outfile, 'v %.15d %.15d %.15d\n', v(n, 1), v(n, 2), v(n,3));
-    end
-    fprintf(outfile, '\n');
-    for n = 1:numvertices
-        fprintf(outfile, 'vt %.15d %.15d\n', vt(n, 1), vt(n, 2));
-    end
-    fprintf(outfile, '\n');
-    for n = 1:numfaces
-        fprintf(outfile, 'f %u/%u %u/%u %u/%u\n', f(n, 1), f(n, 1), f(n, 2), f(n, 2), f(n, 3), f(n, 3));
-    end
-    fclose(outfile);
-    fprintf(1, 'done.\n');
-end
-
-end % of function dcflatten
-
-
-% SUBFUNCTIONS ----------------------------------------
-
-function [f, v] = loaddotobj(objfile)
-% LOADDOTOBJ load an Alias/Wavefront obj file
-% Reads only vertex coordinates and face-vertex indices.
-% Only triangular faces are allowed.
-% Boris Springborn, TU Berlin, 2007
-
-if nargin <1
-    error('File name must be given as argument.')
-end
-
-
-% read the file and store the lines in a cell array of strings
-fid = fopen(objfile,'r');
-if (fid<0)
-    error(['Cannot open file ', objfile, '.']);
-end
-temp = textscan(fid, '%s', 'delimiter', '', 'commentstyle', 'shell');
-fclose(fid);
-thelines = temp{1};
-
-% determine number of faces and vertices
-fn = uint32(0);
-vn = uint32(0);
-for n = 1:size(thelines, 1)
-    aline = thelines{n};
-    switch aline(1)
-        case 'f'
-            fn = fn + 1;
-        case 'v'
-            if (aline(2) == ' ');
-                vn = vn + 1;
-            end
-    end
-end
-
-f = zeros(fn, 3);
-v = zeros(vn, 3);
-
-fnum=uint32(0);
-vnum=uint32(0);
-
-% Line by line parsing of the obj file
-for n = 1:size(thelines, 1);
-    aline = thelines{n};
-    switch aline(1)
-        case '' % blank line
-            % ignore
-        case 'v' % vertex coords
-            if (aline(2) == ' ')
-                vnum = vnum + 1;
-                v(vnum, :) = sscanf(aline(2:end), '%f', 3);
-            end
-        case 'f' % face indices
-            fnum = fnum + 1;
-            %% strip normal and texture indices
-            %stripped = regexprep(aline(2:end), '/[0-9]*', '');
-            %indexes = uint32(sscanf(stripped, '%d'));
-            fields = textscan(aline(2:end), '%s');
-            if (size(fields{1}, 1) ~= 3)
-                error(['Mesh seems to contain a non-triangle face: ', aline]);
-            end
-            %f(1, fnum) = uint32(sscanf(fields{1}{1}, '%u', 1));
-            %f(2, fnum) = uint32(sscanf(fields{1}{2}, '%u', 1));
-            %f(3, fnum) = uint32(sscanf(fields{1}{3}, '%u', 1));
-            i1 = textscan(fields{1}{1}, '%u', 1);
-            i2 = textscan(fields{1}{2}, '%u', 1);
-            i3 = textscan(fields{1}{3}, '%u', 1);
-            f(fnum, :) = [i1{1}, i2{1}, i3{1}];
-    end
-end
-
-if (fnum ~= fn)
-    error('Assertion failure.');
-end
-
-if (vnum ~= vn)
-    error('Assertion failure.');
-end
-
-end % of function loaddotobj
-
-% ------------------------------------------------------------------
-
-function y = clausen(x)
-%CLAUSEN Clausen's integral
-
-% take equivalent x-value between -pi and pi
-x = mod(x + pi, 2 * pi) - pi;
-
-zerox = (x == 0);
-smallx = (~zerox & abs(x) <= 2.0944);
-bigx = ~(zerox | smallx);
-
-x(bigx) = x(bigx) - pi * sign(x(bigx));
-xx = x .* x;
-
-y = zeros(size(x));
-
-y(smallx) = ((((((((((((                    ...
-    2.3257441143020875e-22 * xx(smallx)     ...
-    + 1.0887357368300848e-20) .* xx(smallx)  ...
-    + 5.178258806090624e-19) .* xx(smallx)   ...
-    + 2.5105444608999545e-17) .* xx(smallx)  ...
-    + 1.2462059912950672e-15) .* xx(smallx)  ...
-    + 6.372636443183181e-14) .* xx(smallx)   ...
-    + 3.387301370953521e-12) .* xx(smallx)   ...
-    + 1.8978869988971e-10) .* xx(smallx)     ...
-    + 1.1482216343327455e-8) .* xx(smallx)   ...
-    + 7.873519778281683e-7) .* xx(smallx)    ...
-    + 0.00006944444444444444) .* xx(smallx)  ...
-    + 0.013888888888888888) .* xx(smallx)    ...
-    - reallog(abs(x(smallx))) + 1.0) .* x(smallx);
-
-y(bigx) = ((((((((((((                                ...
-				  3.901950904063069e-15 * xx(bigx)    ...
-				+ 4.566487567193635e-14) .* xx(bigx)   ...
-				+ 5.429792727596476e-13) .* xx(bigx)   ...
-				+ 6.5812165661369675e-12) .* xx(bigx)  ...
-				+ 8.167010963952222e-11) .* xx(bigx)   ...
-				+ 1.0440290284867003e-9) .* xx(bigx)   ...
-				+ 1.3870999114054669e-8) .* xx(bigx)   ...
-				+ 1.941538399871733e-7) .* xx(bigx)    ...
-				+ 2.927965167548501e-6) .* xx(bigx)    ...
-				+ 0.0000496031746031746) .* xx(bigx)   ...
-				+ 0.0010416666666666667) .* xx(bigx)   ...
-				+ 0.041666666666666664) .* xx(bigx)    ...
-				+ -0.693147180559945) .* x(bigx);
-            
-end % of function clausen
-
-
-
-
diff --git a/sandbox/springborn/face.obj b/sandbox/springborn/face.obj
deleted file mode 100644
index aa26a94..0000000
--- a/sandbox/springborn/face.obj
+++ /dev/null
@@ -1,3041 +0,0 @@
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-f 736 765 707
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-f 800 801 747
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-f 801 748 747
-f 691 775 749
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-f 663 776 777
-f 778 693 692
-f 750 721 720
-f 751 721 779
-f 752 780 723
-f 754 753 781
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-f 732 761 788
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-f 762 789 733
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-f 764 790 791
-f 822 792 765
-f 765 764 791
-f 793 737 765
-f 792 793 765
-f 767 793 794
-f 793 825 794
-f 767 795 768
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-f 770 769 796
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-f 827 772 771
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-f 745 772 798
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-f 799 746 773
-f 799 800 774
-f 832 748 801
-f 775 748 871
-f 775 871 802
-f 803 776 802
-f 777 776 803
-f 805 778 804
-f 853 693 778
-f 806 664 693
-f 806 779 750
-f 806 807 779
-f 751 779 808
-f 751 809 752
-f 808 779 807
-f 809 780 752
-f 808 809 751
-f 781 780 810
-f 780 809 810
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-f 812 783 782
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-f 814 757 813
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-f 814 815 784
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-f 785 815 816
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-f 817 816 839
-f 818 787 786
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-f 788 787 818
-f 818 819 788
-f 819 789 788
-f 820 789 819
-f 821 790 789
-f 820 821 789
-f 791 790 821
-f 791 821 822
-f 791 822 765
-f 823 792 822
-f 824 792 844
-f 824 793 792
-f 766 793 767
-f 793 824 825
-f 794 825 795
-f 825 796 795
-f 825 826 796
-f 797 827 771
-f 796 826 797
-f 827 828 772
-f 797 826 827
-f 798 828 846
-f 798 846 829
-f 798 829 799
-f 830 799 829
-f 830 800 799
-f 830 831 800
-f 801 800 831
-f 801 831 832
-f 871 850 802
-f 804 833 805
-f 853 875 806
-f 806 854 807
-f 807 854 808
-f 810 809 834
-f 810 835 811
-f 835 810 834
-f 836 812 811
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-f 813 812 837
-f 812 836 837
-f 813 838 814
-f 813 837 859
-f 838 815 814
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-f 816 838 839
-f 816 817 786
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-f 840 818 839
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-f 819 818 842
-f 818 841 842
-f 819 842 820
-f 820 843 821
-f 822 821 843
-f 823 844 792
-f 825 824 844
-f 825 844 864
-f 845 826 825
-f 827 826 845
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-f 829 846 847
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-f 849 870 831
-f 832 831 870
-f 832 919 905
-f 832 905 748
-f 871 748 905
-f 803 850 851
-f 777 803 851
-f 802 850 803
-f 874 853 852
-f 805 852 853
-f 778 805 853
-f 853 806 693
-f 921 854 806
-f 855 809 808
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-f 834 809 855
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-f 860 838 859
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-f 861 841 840
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-f 881 862 820
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-f 850 871 872
-f 852 873 874
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-f 921 806 875
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-f 822 884 863
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-f 889 847 866
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-f 873 906 874
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-f 881 897 882
-f 898 882 911
-f 911 882 897
-f 843 883 884
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-f 888 887 902
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-f 904 889 903
-f 904 868 889
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-f 919 832 870
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-f 943 904 942
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-f 975 953 905
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-f 907 932 958
-f 977 922 965
-f 977 933 922
-f 949 936 924
-f 949 950 936
-f 937 936 950
-f 937 950 951
-f 937 938 926
-f 938 937 951
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-f 940 928 952
-f 960 941 940
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-f 942 973 943
-f 975 945 969
-f 872 954 851
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-f 946 957 947
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-f 958 932 947
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-f 920 958 965
-f 924 923 959
-f 924 959 949
-f 972 938 951
-f 940 952 967
-f 940 967 960
-f 973 961 983
-f 973 974 943
-f 962 953 975
-f 962 954 953
-f 955 954 963
-f 956 964 957
-f 970 957 964
-f 970 958 957
-f 948 978 971
-f 979 935 971
-f 979 923 935
-f 959 923 979
-f 966 949 959
-f 966 950 949
-f 991 992 966
-f 951 950 992
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-f 939 980 993
-f 981 960 1000
-f 982 961 960
-f 981 982 960
-f 983 961 982
-f 968 1002 930
-f 945 975 905
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-f 934 933 989
-f 934 989 978
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-f 959 979 990
-f 959 990 966
-f 972 980 938
-f 943 944 891
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-f 930 1003 969
-f 996 975 969
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-f 967 952 993
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-f 967 1000 960
-f 984 973 983
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-f 987 970 997
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-f 987 988 976
-f 977 976 988
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-f 1005 979 971
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-f 938 980 939
-f 994 1000 967
-f 1001 995 982
-f 983 982 995
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-f 986 996 1004
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-f 999 1011 989
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-f 992 1033 1009
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-f 1010 994 993
-f 1001 981 1000
-f 1001 982 981
-f 1020 944 1019
-f 1037 1021 1020
-f 968 1021 1002
-f 968 930 944
-f 1002 1003 930
-f 1008 1032 992
-f 1009 993 980
-f 1010 1033 994
-f 1000 994 1033
-f 1012 984 983
-f 1012 974 984
-f 1003 1002 1021
-f 1013 1003 1039
-f 996 1003 1013
-f 1014 1004 996
-f 1017 1018 998
-f 1028 989 1011
-f 978 989 1028
-f 1030 1006 1005
-f 1030 1007 1006
-f 1034 1001 1000
-f 1034 995 1001
-f 983 995 1035
-f 983 1035 1012
-f 1012 1019 974
-f 944 974 1019
-f 1038 1003 1021
-f 1038 1039 1003
-f 996 1013 1014
-f 1016 997 1015
-f 1016 1017 997
-f 1017 998 997
-f 1018 999 998
-f 1018 1011 999
-f 978 1028 1029
-f 1029 1005 978
-f 1035 995 1034
-f 1036 1012 1035
-f 1036 1019 1012
-f 1013 1039 1040
-f 1040 1014 1013
-f 1040 1041 1014
-f 1014 1041 1022
-f 1024 1025 1016
-f 1024 1015 1023
-f 1025 1017 1016
-f 1024 1016 1015
-f 1018 1017 1025
-f 1018 1025 1026
-f 1026 1027 1018
-f 1027 1011 1018
-f 1011 1027 1028
-f 1005 1029 1030
-f 1007 1030 1031
-f 1007 1031 1008
-f 1032 1008 1031
-f 1033 992 1032
-f 1009 1033 1010
-f 1000 1033 1034
-f 1036 1037 1019
-f 1020 1019 1037
-f 1021 944 1020
-f 1037 1038 1021
-f 1022 1041 1042
diff --git a/sandbox/stripack/a.out b/sandbox/stripack/a.out
deleted file mode 100755
index e1aa016..0000000
Binary files a/sandbox/stripack/a.out and /dev/null differ
diff --git a/sandbox/stripack/driver.c b/sandbox/stripack/driver.c
deleted file mode 100644
index 55776d5..0000000
--- a/sandbox/stripack/driver.c
+++ /dev/null
@@ -1,98 +0,0 @@
-#include <stdio.h>
-#include <stdlib.h>
-#include <setjmp.h>
-#include <math.h>
-
-void trmesh_ (int *n, double *x, double *y, double *z,
-	     int *list, int *lptr, int *lend, int *lnew,
-	     int *__near, int *__next, double *__dist, int *ier);
-
-void crlist_ (unsigned *n, unsigned *ncol, double *x, double *y, double *z,
-	      int *list, unsigned *lptr, unsigned *lend, unsigned *lnew,
-	      unsigned *__ltri, unsigned *__listc, unsigned *nb,
-	      double *xc, double *yc, double *zc, double *rc, int *ier);
-
-void trfind_ (int *nst, double *p, unsigned *n, double *x, double *y, double *z, int *list, unsigned *lptr, unsigned *lend, double *b1, double *b2, double *b3, int *i1, int *i2, int *i3);
-
-static jmp_buf env;
-static int activate_trap;
-
-static void trap(void) {
-  if (activate_trap)
-    longjmp (env, 1);
-}
-
-int main(int argc, char *argv[]) {
-  int i;
-#if 0
-  int n = 9;
-  double x[9] = { 0.8, 0.0, -0.8, 0.6, 0.8, 0.0, 0.0, -1.0, 0.0 };
-  double y[9] = { 0.6, 0.8, -0.6, 0.8, 0.0, 0.6, -1.0, 0.0, 0.0 };
-  double z[9] = { 0.0, 0.6, 0.0, 0.0, 0.6, 0.8, 0.0, 0.0, -1.0 };
-#elif 0
-  int n = 3; /* 6 */
-  double x[7] = { 1.0, 0.0, 0.0, -1.0, 0.0, 0.0 };
-  double y[7] = { 0.0, 1.0, 0.0, 0.0, -1.0, 0.0 };
-  double z[7] = { 0.0, 0.0, 1.0, 0.0, 0.0, -1.0 };
-#elif 0
-  int n = 3;
-  double x[7] = { 1.0, 0.0, 0.0, 0.0 };
-  double y[7] = { 0.0, 1.0, 0.0, -1.0 };
-  double z[7] = { 0.0, 0.0, 1.0, 0.5 };
-#else
-  int n = 5;
-  double x[5] = { -0.516749769175181 };
-  double y[5] = { -0.839510890144121 };
-  double z[5] = { -0.167902178028824 };
-  for (i = 1; i < 5; i++) {
-    x[i] = sin(M_PI*i/n);
-    y[i] = 0.0;
-    z[i] = cos(M_PI*i/n);
-  }
-#endif
-
-  int list[100], lptr[100], lend[100], lnew, __near[100], __next[100], ier;
-  double __dist[100];
-  
-  atexit (trap);
-  activate_trap = 1;
-  if (setjmp(env)) {
-    atexit (trap);
-    printf("trapped...");
-  }
-
-  trmesh_ ( &n, x, y, z, list, lptr, lend, &lnew, __near, __next, __dist, &ier);
-
-  printf("lnew = %d, error %d\n", lnew, ier);
-  for (i = 0; i < n; i++) {
-    int e = lend[i]-1, j = e;
-    do {
-      j = lptr[j]-1;
-      printf("edge %d: %d::%d\n", j, i+1, list[j]);
-    } while (j!=e);
-  }
-
-  int nst = 1, ind[3];
-  double p[3], b[3];
-  for (i = 0; i < 3; i++)
-    sscanf(argv[i+1], "%lg", p+i);
-
-  trfind_ (&nst, p, &n, x, y, z, list, lptr, lend, b, b+1, b+2, ind, ind+1, ind+2);
-
-  printf("indices (%d,%d,%d), coords (%lg,%lg,%lg)\n", ind[0], ind[1], ind[2], b[0], b[1], b[2]);
-
-#if 1
-  int ncol = 10;
-  int ltri[1000], listc[1000], nb;
-  double xc[1000], yc[1000], zc[1000], rc[1000];
-
-  crlist_ ( &n, &ncol, x, y, z, list, lend, lptr, &lnew, ltri, listc, &nb, xc, yc, zc, rc, &ier);
-
-  for (i = 0; i < 2*n-4; i++) {
-    printf("center %d: (%lg,%lg,%lg), radius=%lg\n", i, xc[i], yc[i], zc[i], rc[i]);
-  }
-#endif
-
-  activate_trap = 0;
-  return 0;
-}
diff --git a/sandbox/stripack/grafpack.o b/sandbox/stripack/grafpack.o
deleted file mode 100644
index a6a7d63..0000000
Binary files a/sandbox/stripack/grafpack.o and /dev/null differ
diff --git a/sandbox/stripack/grafpack_prb.f90 b/sandbox/stripack/grafpack_prb.f90
deleted file mode 100644
index bb65c5f..0000000
--- a/sandbox/stripack/grafpack_prb.f90
+++ /dev/null
@@ -1,7051 +0,0 @@
-program main
-
-!*****************************************************************************80
-!
-!! MAIN is the main program for GRAFPACK.
-!
-!  Discussion:
-!
-!    GRAFPACK_PRB calls the GRAFPACK test routines.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    18 September 2006
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  call timestamp ( )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'GRAFPACK_PRB'
-  write ( *, '(a)' ) '  FORTRAN90 version'
-  write ( *, '(a)' ) '  Tests for the GRAFPACK graph routines.'
-
-  call test001
-  call test002
-  call test003
-  call test004
-  call test005
-  call test006
-  call test007
-  call test008
-  call test009
-  call test0095
-  call test010
-  call test0105
-
-  call test011
-  call test012
-  call test013
-  call test014
-  call test015
-  call test0155
-  call test016
-  call test017
-  call test018
-  call test019
-  call test020
-
-  call test021
-  call test022
-  call test023
-  call test024
-  call test025
-  call test026
-  call test027
-  call test028
-  call test029
-  call test030
-
-  call test031
-  call test032
-  call test033
-  call test034
-  call test035
-  call test0335
-  call test036
-  call test0365
-  call test0366
-  call test037
-  call test0375
-  call test038
-  call test039
-  call test040
-
-  call test041
-  call test042
-  call test043
-  call test044
-  call test045
-  call test046
-  call test047
-  call test048
-  call test049
-  call test050
-
-  call test051
-  call test052
-  call test053
-  call test054
-  call test055
-  call test056
-  call test057
-  call test058
-  call test059
-  call test060
-
-  call test061
-  call test062
-  call test063
-  call test064
-  call test065
-  call test066
-  call test0665
-  call test067
-  call test068
-  call test069
-  call test0695
-  call test0696
-  call test0697
-  call test070
-
-  call test071
-  call test072
-  call test073
-  call test074
-  call test075
-  call test076
-  call test077
-  call test078
-  call test079
-  call test080
-
-  call test081
-  call test082
-  call test083
-  call test084
-  call test085
-  call test086
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'GRAFPACK_PRB'
-  write ( *, '(a)' ) '  Normal end of execution.'
-
-  write ( *, '(a)' ) ' '
-  call timestamp ( )
-
-  stop
-end
-subroutine test001
-
-!*****************************************************************************80
-!
-!! TEST001 tests COLOR_DIGRAPH_ADJ_RANDOM;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-
-  integer adj(nnode,nnode)
-  integer mcolor
-  integer ncolor
-  integer nedge
-  integer seed
-
-  seed = 123456789
-  ncolor = 3
-  nedge = 15
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST001'
-  write ( *, '(a)' ) '  COLOR_DIGRAPH_ADJ_RANDOM returns a random '
-  write ( *, '(a)' ) '  color digraph.'
-  write ( *, '(a)' ) ' '
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Random object is to have:'
-  write ( *, '(a,i8)' ) '  Number of colors = ', ncolor
-  write ( *, '(a,i8)' ) '  Number of nodes = ', nnode
-  write ( *, '(a,i8)' ) '  Number of edges = ', nedge
-
-  call color_digraph_adj_random ( nnode, ncolor, nedge, seed, adj )
-
-  call color_digraph_adj_print ( adj, nnode, nnode, '  The color digraph:' )
-!
-!  Count the edges.
-!
-  call color_digraph_adj_edge_count ( adj, nnode, nnode, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of edges is ', nedge
-!
-!  Count the colors.
-!
-  call color_graph_adj_color_count ( adj, nnode, nnode, mcolor, ncolor )
-
-  write ( *, '(a,i8)' ) '  Number of colors is    ', ncolor
-  write ( *, '(a,i8)' ) '  Maximum color index is ', mcolor
-
-  return
-end
-subroutine test002
-
-!*****************************************************************************80
-!
-!! TEST002 tests COLOR_GRAPH_ADJ_CONNECT_RANDOM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer mcolor
-  integer ncolor
-  integer nedge
-  integer result
-  integer seed
-
-  ncolor = 3
-  nedge = 8
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST002'
-  write ( *, '(a)' ) '  COLOR_GRAPH_ADJ_CONNECT_RANDOM returns a random ' // &
-    'connected color graph;'
-  write ( *, '(a)' ) ' '
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Random object is to have:'
-  write ( *, '(a,i8)' ) '  Number of colors = ', ncolor
-  write ( *, '(a,i8)' ) '  Number of nodes = ', nnode
-  write ( *, '(a,i8)' ) '  Number of edges = ', nedge
-
-  call color_graph_adj_connect_random ( lda, nnode, nedge, ncolor, seed, adj )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-!
-!  Check connectedness.
-!
-  call graph_adj_is_edge_connected ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT edgewise connected.'
-  else
-    write ( *, '(a)' ) '  The graph IS edgewise connected.'
-  end if
-
-  call graph_adj_is_node_connected ( adj, lda, nnode, result )
-
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT nodewise connected.'
-  else
-    write ( *, '(a)' ) '  The graph IS nodewise connected.'
-  end if
-!
-!  Count the edges.
-!
-  call color_graph_adj_edge_count ( adj, lda, nnode, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of edges is ', nedge
-!
-!  Count the colors.
-!
-  call color_graph_adj_color_count ( adj, lda, nnode, mcolor, ncolor )
- 
-  write ( *, '(a,i8)' ) '  Number of colors is    ', ncolor
-  write ( *, '(a,i8)' ) '  Maximum color index is ', mcolor
-
-  return
-end 
-subroutine test003
-
-!*****************************************************************************80
-!
-!! TEST003 tests COLOR_GRAPH_ADJ_RANDOM;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer mcolor
-  integer ncolor
-  integer nedge
-  integer seed
-
-  ncolor = 3
-  nedge = 7
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST003'
-  write ( *, '(a)' ) '  COLOR_GRAPH_ADJ_RANDOM returns a random color digraph.'
-  write ( *, '(a)' ) ' '
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Random object is to have:'
-  write ( *, '(a,i8)' ) '  Number of colors = ', ncolor
-  write ( *, '(a,i8)' ) '  Number of nodes = ', nnode
-  write ( *, '(a,i8)' ) '  Number of edges = ', nedge
-
-  call color_graph_adj_random ( lda, nnode, ncolor, nedge, seed, adj )
-
-  call color_graph_adj_print ( adj, lda, nnode, '  The color graph:' )
-!
-!  Count the edges.
-!
-  call color_graph_adj_edge_count ( adj, lda, nnode, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of edges is ', nedge
-!
-!  Count the colors.
-!
-  call color_graph_adj_color_count ( adj, lda, nnode, mcolor, ncolor )
- 
-  write ( *, '(a,i8)' ) '  Number of colors is    ', ncolor
-  write ( *, '(a,i8)' ) '  Maximum color index is ', mcolor
-
-  return
-end
-subroutine test004
-
-!*****************************************************************************80
-!
-!! TEST004 tests DEGREE_SEQ_IS_GRAPHIC.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: ntest = 5
-
-  integer degree_seq(nnode)
-  integer i
-  integer result
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST004'
-  write ( *, '(a)' ) '  DEGREE_SEQ_IS_GRAPHIC reports whether'
-  write ( *, '(a)' ) '  a given sequence can represent the degree'
-  write ( *, '(a)' ) '  sequence of a graph.'
-  write ( *, '(a)' ) ' '
-
-  do i = 1, ntest
-
-    call i4vec_uniform ( nnode, 1, nnode-1, seed, degree_seq )
-
-    call i4vec_sort_heap_d ( nnode, degree_seq )
-
-    call i4vec_print ( nnode, degree_seq, '  The degree sequence:' )
-
-    call degree_seq_is_graphic ( nnode, degree_seq, result )
-
-    write ( *, '(a)' ) ' '
-    if ( result == 0 ) then
-      write ( *, '(a)' ) '  The sequence is NOT graphic.'
-    else if ( result == 1 ) then
-      write ( *, '(a)' ) '  The sequence IS graphic.'
-    end if
-
-  end do
-
-  return
-end
-subroutine test005
-
-!*****************************************************************************80
-!
-!! TEST005 tests DEGREE_SEQ_TO_GRAPH_ADJ.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,lda)
-  integer ierror
-  integer, dimension ( nnode ) :: seq = (/ 5, 5, 4, 3, 3, 2 /)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST005'
-  write ( *, '(a)' ) '  DEGREE_SEQ_TO_GRAPH_ADJ is given a degree'
-  write ( *, '(a)' ) '    sequence, and constructs the adjancency'
-  write ( *, '(a)' ) '    matrix of a corresponding graph.'
-
-  call i4vec_print ( nnode, seq, '  The degree sequence:' )
-
-  call degree_seq_to_graph_adj ( nnode, seq, lda, adj, ierror )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  return
-end
-subroutine test006
-
-!*****************************************************************************80
-!
-!! TEST006 tests DIGRAPH_ADJ_CLOSURE and DIGRAPH_ADJ_REDUCE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 13
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,6) = 1
-  adj(1,7) = 1
-
-  adj(3,1) = 1
-
-  adj(4,6) = 1
-
-  adj(5,4) = 1
-
-  adj(6,5) = 1
-
-  adj(7,3) = 1
-  adj(7,5) = 1
-  adj(7,10) = 1
-
-  adj(8,7) = 1
-  adj(8,9) = 1
-
-  adj(9,8) = 1
-
-  adj(10,11) = 1
-  adj(10,12) = 1
-  adj(10,13) = 1
-
-  adj(12,7) = 1
-  adj(12,13) = 1
-
-  adj(13,12) = 1
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST006'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_CLOSURE finds the transitive '
-  write ( *, '(a)' ) '    closure of a digraph;'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_REDUCE finds the transitive '
-  write ( *, '(a)' ) '    reduction of a digraph.'
-  write ( *, '(a)' ) ' '
-
-  call digraph_adj_print ( adj, lda, nnode, '  Adjacency matrix for G:' )
-
-  call digraph_adj_closure ( adj, lda, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, &
-    '  Adjacency matrix for H, the transitive closure of G:' )
-
-  call digraph_adj_reduce ( adj, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, &
-    '  Adjacency matrix for G2, the transitive reduction of H:' )
-
-  call digraph_adj_closure ( adj, lda, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, &
-    '  Adjacency matrix for H2, the transitive closure of G2:' )
-
-  return
-end
-subroutine test007
-
-!*****************************************************************************80
-!
-!! TEST007 tests DIGRAPH_ADJ_COMPONENTS.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 13
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer comp(nnode)
-  integer dad(nnode)
-  integer i
-  integer j
-  integer ncomp
-  integer order(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST007'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_COMPONENTS finds strongly connected'
-  write ( *, '(a)' ) '    components of a directed graph.'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,11) = 1
-
-  adj(2,3) = 1
-  adj(2,6) = 1
-
-  adj(3,4) = 1
-  adj(3,5) = 1
-
-  adj(4,3) = 1
-
-  adj(5,4) = 1
-
-  adj(6,7) = 1
-  adj(6,8) = 1
-
-  adj(7,6) = 1
-
-  adj(8,9) = 1
-  adj(8,10) = 1
-
-  adj(9,7) = 1
-
-  adj(10,9) = 1
-
-  adj(11,12) = 1
-  adj(11,13) = 1
-
-  adj(12,1) = 1
-
-  adj(13,1) = 1
-  adj(13,12) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph' )
- 
-  call digraph_adj_components ( adj, lda, nnode, ncomp, comp, dad, order )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of components = ', ncomp
-  write ( *, '(a)' ) ' ' 
-  write ( *, '(a)' ) '  Node, Dad, Component, Order'
-  write ( *, '(a)' ) ' '
-
-  do i = 1, nnode
-    write ( *, '(5i8)' ) i, dad(i), comp(i), order(i)
-  end do
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  The correct components are:'
-  write ( *, '(a)' ) ' (1,11,12,13), (2), (3,4,5), (6,7,8,9,10).'
-!
-!  Compute a reordering of the nodes.
-!
-  do i = 1, nnode
-    order(i) = i
-  end do
-
-  do i = 2, nnode
-    do j = 1, i - 1
-      if ( comp(j) > comp(i) .or. &
-         ( comp(j) == comp(i) .and. order(j) > order(i) ) ) then
-        call i4_swap ( comp(j), comp(i) )
-        call i4_swap ( order(j), order(i) )
-      end if
-    end do
-  end do
-
-  call i4vec2_print ( nnode, comp, order, '  I, Component(I), Node(I)' )
-
-  call perm_inv ( nnode, order )
-
-  call i4mat_perm ( lda, nnode, adj, order )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  return
-end 
-subroutine test008
-
-!*****************************************************************************80
-!
-!! TEST008 tests DIGRAPH_ADJ_CYCLE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: lda = 9
-
-  integer adj(lda,lda)
-  integer adj2(lda,lda)
-  integer dad(lda)
-  integer i
-  integer nedge
-  integer nnode
-  integer order(lda)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST008'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_CYCLE searches for cycles in a digraph.'
-
-  call digraph_adj_example_cycler ( adj, lda, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-!
-!  Count the edges.
-!
-  call digraph_adj_edge_count ( adj, lda, nnode, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  The number of edges is ', nedge
-
-  call digraph_adj_cycle ( adj, lda, nnode, adj2, dad, order )
-
-  call i4vec2_print ( nnode, dad, order, '  Node, Dad, Order' )
-
-  write ( *, '(a)' ) ' ' 
-  write ( *, '(a)' ) '  Adjacency matrix with cycles marked.'
-  write ( *, '(a)' ) ' '
-  
-  do i = 1, nnode
-    write ( *, '(10i3)' ) adj2(i,1:nnode)
-  end do
-
-  return
-end
-subroutine test009
-
-!*****************************************************************************80
-!
-!! TEST009 tests DIGRAPH_ADJ_DEGREE, DIGRAPH_ADJ_DEGREE_MAX, DIGRAPH_ADJ_DEGREE_SEQ.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: lda = 10
-
-  integer adj(lda,lda)
-  integer degree_max
-  integer indegree(lda)
-  integer indegree_max
-  integer indegree_seq(lda)
-  integer nnode
-  integer outdegree(lda)
-  integer outdegree_max
-  integer outdegree_seq(lda)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST009'
-  write ( *, '(a)' ) '  For a directed graph:'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_DEGREE computes the degree of the nodes;'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_DEGREE_MAX computes the maximum'
-  write ( *, '(a)' ) '    degree of the nodes;'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_DEGREE_SEQ computes the degree'
-  write ( *, '(a)' ) '    sequence;'
-
-  call digraph_adj_example_cycler ( adj, lda, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_degree ( adj, lda, nnode, indegree, outdegree )
-
-  call i4vec2_print ( nnode, indegree, outdegree, '  Node, In/Outdegree' )
-
-  call digraph_adj_degree_seq ( adj, lda, nnode, indegree_seq, outdegree_seq )
-
-  call i4vec2_print ( nnode, indegree_seq, outdegree_seq, &
-    '  Node, In/Outdegree sequence' )
-
-  call digraph_adj_degree_max ( adj, lda, nnode, indegree_max, outdegree_max, &
-    degree_max )
-
-  write ( *, '(a)' ) ' ' 
-  write ( *, '(a,i8)' ) '  Maximum  indegree is ',  indegree_max
-  write ( *, '(a,i8)' ) '  Maximum outdegree is ', outdegree_max
-  write ( *, '(a,i8)' ) '  Maximum    degree is ',    degree_max
-  write ( *, '(a)' ) ' '
-
-  return
-end
-subroutine test0095
-
-!*****************************************************************************80
-!
-!! TEST0095 tests DIGRAPH_ADJ_EIGEN.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: lda = 9
-
-  integer adj(lda,lda)
-  real ( kind = 8 ) eigeni(lda)
-  real ( kind = 8 ) eigenr(lda)
-  integer neigen
-  integer nnode
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0095'
-  write ( *, '(a)' ) '  For a digraph:'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_EIGEN computes the eigenvalues.'
-
-  call digraph_adj_example_cycler ( adj, lda, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_eigen ( adj, lda, nnode, neigen, eigenr, eigeni )
-
-  call r8vec2_print ( neigen, eigenr, eigeni, &
-    '  Real and imaginary parts of eigenvalues:' )
-
-  if ( neigen < nnode ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  Warning!  Not all eigenvalues were computed.'
-  end if
-
-  return
-end
-subroutine test010
-
-!*****************************************************************************80
-!
-!! TEST010 tests DIGRAPH_ADJ_HAM_NEXT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 20
-  integer, parameter :: lda = nnode
-  integer, parameter :: maxstack = 100
-
-  integer adj(lda,nnode)
-  integer circuit(nnode)
-  integer i
-  integer j
-  logical more
-  integer ncan(nnode)
-  integer stack(maxstack)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST010'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_HAM_NEXT produces Hamilton circuits;'
-  write ( *, '(a)' ) ' '
- 
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,8) = 1
-  adj(1,2) = 1
-  adj(1,20) = 1
-  adj(2,3) = 1
-  adj(2,15) = 1
-  adj(3,7) = 1
-  adj(3,4) = 1
-  adj(4,5) = 1
-  adj(4,14) = 1
-  adj(5,6) = 1
-  adj(5,12) = 1
-  adj(6,10) = 1
-  adj(6,7) = 1
-  adj(7,8) = 1
-  adj(8,9) = 1
-  adj(9,10) = 1
-  adj(9,19) = 1
-  adj(10,11) = 1
-  adj(11,12) = 1
-  adj(11,18) = 1
-  adj(12,13) = 1
-  adj(13,14) = 1
-  adj(13,17) = 1
-  adj(14,15) = 1
-  adj(15,16) = 1
-  adj(16,17) = 1
-  adj(16,20) = 1
-  adj(17,18) = 1
-  adj(18,19) = 1
-  adj(19,20) = 1
- 
-  do i = 1, nnode-1
-    do j = i+1, nnode
-      if ( adj(i,j) == 1 ) then
-        adj(j,i) = 1
-      end if
-    end do
-  end do
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-  i = 0
-
-  more = .false.
-
-  do
-
-    call digraph_adj_ham_next ( adj, lda, nnode, circuit, stack, maxstack, &
-      ncan, more )
-
-    if ( .not. more ) then
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,20i3)' ) i, circuit(1:nnode)
-
-  end do
- 
-  return
-end
-subroutine test0105
-
-!*****************************************************************************80
-!
-!! TEST0105 tests DIGRAPH_ADJ_HAM_NEXT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-  integer, parameter :: lda = nnode
-  integer, parameter :: maxstack = 100
-
-  integer adj(lda,nnode)
-  integer circuit(nnode)
-  integer i
-  logical more
-  integer ncan(nnode)
-  integer stack(maxstack)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0105'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_HAM_NEXT produces Hamilton circuits;'
-  write ( *, '(a)' ) ' '
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,6) = 1
- 
-  adj(2,3) = 1
-  adj(2,5) = 1
- 
-  adj(3,4) = 1
- 
-  adj(4,1) = 1
-  adj(4,5) = 1
-  adj(4,8) = 1
- 
-  adj(5,1) = 1
-  adj(5,2) = 1
-  adj(5,3) = 1
-  adj(5,4) = 1
-  adj(5,7) = 1
-  adj(5,8) = 1
-  adj(5,9) = 1
- 
-  adj(6,3) = 1
-  adj(6,5) = 1
-  adj(6,8) = 1
- 
-  adj(7,2) = 1
-  adj(7,4) = 1
-  adj(7,5) = 1
- 
-  adj(8,4) = 1
-  adj(8,5) = 1
-  adj(8,6) = 1
-  adj(8,9) = 1
- 
-  adj(9,5) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-  i = 0
-
-  more = .false.
-
-  do
-
-    call digraph_adj_ham_next ( adj, lda, nnode, circuit, stack, maxstack, &
-      ncan, more )
-
-    if ( .not. more ) then
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,20i3)' ) i, circuit(1:nnode)
-
-  end do
- 
-  return
-end
-subroutine test011
-
-!*****************************************************************************80
-!
-!! TEST011 tests DIGRAPH_ADJ_HAM_NEXT_BRUTE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer circuit(nnode)
-  integer i
-  integer iset
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST011'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_HAM_NEXT_BRUTE seeks circuits'
-  write ( *, '(a)' ) '    in a directed graph which visit every node.'
-  write ( *, '(a)' ) '  A brute force algorithm is used.'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,6) = 1
- 
-  adj(2,3) = 1
-  adj(2,5) = 1
- 
-  adj(3,4) = 1
- 
-  adj(4,1) = 1
-  adj(4,5) = 1
-  adj(4,8) = 1
- 
-  adj(5,1) = 1
-  adj(5,2) = 1
-  adj(5,3) = 1
-  adj(5,4) = 1
-  adj(5,7) = 1
-  adj(5,8) = 1
-  adj(5,9) = 1
- 
-  adj(6,3) = 1
-  adj(6,5) = 1
-  adj(6,8) = 1
- 
-  adj(7,2) = 1
-  adj(7,4) = 1
-  adj(7,5) = 1
- 
-  adj(8,4) = 1
-  adj(8,5) = 1
-  adj(8,6) = 1
-  adj(8,9) = 1
- 
-  adj(9,5) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
- 
-  iset = 0
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-  i = 0
-
-  do
- 
-    call digraph_adj_ham_next_brute ( adj, lda, nnode, circuit, iset )
- 
-    if ( iset == 0 ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) '  No more circuits were found.'
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,20i3)' ) i, circuit(1:nnode)
-
-  end do
- 
-  return
-end
-subroutine test012
-
-!*****************************************************************************80
-!
-!! TEST012 tests DIGRAPH_ADJ_HAM_PATH_NEXT_BRUTE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 4
-  integer, parameter :: lda = nnode
-
-  integer i
-  integer adj(lda,nnode)
-  integer iset
-  integer j
-  integer path(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST012'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_HAM_PATH_NEXT_BRUTE seeks paths in a'
-  write ( *, '(a)' ) '    digraph which visit every node once.'
-  write ( *, '(a)' ) '  A brute force algorithm is used.'
-!
-!  Initialize the adjacency matrix to the identity.
-!
-  do i = 1, nnode
-    do j = 1, nnode
-      if ( i == j ) then
-        adj(i,j) = 1
-      else
-        adj(i,j) = 0
-      end if
-    end do
-  end do
-!
-!  Add entries for specific edges.  This is a directed graph.
-!  ADJ(I, j) = 1 means there's a edge from I to J.
-!
-  adj(1,2) = 1
-  adj(1,4) = 1
- 
-  adj(2,4) = 1
- 
-  adj(3,1) = 1
-  adj(3,4) = 1
- 
-  adj(4,2) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
- 
-  iset = 0
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Paths:'
-  write ( *, '(a)' ) ' '
-  i = 0
-
-  do
- 
-    call digraph_adj_ham_path_next_brute ( adj, lda, nnode, path, iset )
- 
-    if ( iset == 0 ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) '  No more paths were found.'
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,20i3)' ) i, path(1:nnode)
-
-  end do
- 
-  return
-end
-subroutine test013
-
-!*****************************************************************************80
-!
-!! TEST013 tests DIGRAPH_ADJ_IS_EDGE_CONNECTED;
-!
-!  Discussion:
-!
-!    Here is a picture of the digraph.
-!
-!    1-->--2
-!    |     |
-!    A     A
-!    |     |
-!    4--<--3
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 4
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer result
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST013'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_IS_EDGE_CONNECTED reports if a'
-  write ( *, '(a)' ) '    digraph is edgewise connected;'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(3,2) = 1
-  adj(3,4) = 1
-  adj(4,1) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_is_edge_connected ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The digraph is NOT edgewise connected.'
-  else
-    write ( *, '(a)' ) '  The digraph IS edgewise connected.'
-  end if
-
-  return
-end 
-subroutine test014
-
-!*****************************************************************************80
-!
-!! TEST014 tests DIGRAPH_ADJ_IS_EULERIAN;
-!
-!  Discussion:
-!
-!    Here is a picture of the digraph:
-!
-!    1->---2-->---3
-!        A V      V
-!      6<--5--<---4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer result
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST014'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_IS_EULERIAN reports if a digraph is Eulerian;'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(2,3) = 1
-  adj(3,4) = 1
-  adj(4,5) = 1
-  adj(5,6) = 1
-  adj(6,2) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_is_eulerian ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The digraph is NOT Eulerian.'
-  else if ( result == 1 ) then
-    write ( *, '(a)' ) '  The digraph IS path Eulerian.'
-  else if ( result == 2 ) then
-    write ( *, '(a)' ) '  The digraph IS circuit Eulerian.'
-  end if
-
-  return
-end
-subroutine test015
-
-!*****************************************************************************80
-!
-!! TEST015 tests DIGRAPH_ADJ_IS_STRONG_CONNECTED;
-!
-!  Discussion:
-!
-!    Here are pictures of the digraphs:
-!
-!  1)
-!
-!    1-->--2
-!    |     |
-!    A     A
-!    |     |
-!    4--<--3
-!
-!  2)
-!
-!    1-->--2-->--3-->--4
-!    |     |     |     |
-!    A     V     A     V
-!    |     |     |     |
-!    5--<--6     7--<--8
-!
-!  3)
-!
-!    1-->--2-->--3-->--4
-!    |     |     |     |
-!    A     V     A     V
-!    |     |     |     |
-!    5--<--6--<--7--<--8
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: lda = 8
-
-  integer adj(lda,lda)
-  integer nnode
-  integer result
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST015'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_IS_STRONG_CONNECTED reports if a'
-  write ( *, '(a)' ) '    digraph is strongly connected;'
-
-  nnode = 4
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(3,2) = 1
-  adj(3,4) = 1
-  adj(4,1) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_is_strong_connected ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The digraph is NOT strongly connected.'
-  else
-    write ( *, '(a)' ) '  The digraph IS strongly connected.'
-  end if
-
-  nnode = 8
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(2,3) = 1
-  adj(2,6) = 1
-  adj(6,5) = 1
-  adj(5,1) = 1
-  adj(3,4) = 1
-  adj(4,8) = 1
-  adj(8,7) = 1
-  adj(7,3) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_is_strong_connected ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The digraph is NOT strongly connected.'
-  else
-    write ( *, '(a)' ) '  The digraph IS strongly connected.'
-  end if
-
-  nnode = 8
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(2,3) = 1
-  adj(2,6) = 1
-  adj(6,5) = 1
-  adj(5,1) = 1
-  adj(3,4) = 1
-  adj(4,8) = 1
-  adj(8,7) = 1
-  adj(7,3) = 1
-  adj(7,6) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_is_strong_connected ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The digraph is NOT strongly connected.'
-  else
-    write ( *, '(a)' ) '  The digraph IS strongly connected.'
-  end if
-
-  return
-end 
-subroutine test0155
-
-!*****************************************************************************80
-!
-!! TEST0155 tests DIGRAPH_ADJ_TOURNAMENT_RANDOM, DIGRAPH_ADJ_IS_TOURNAMENT;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,lda)
-  integer result
-  integer seed
-
-  seed = 123456789
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0155'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_TOURNAMENT_RANDOM returns a random'
-  write ( *, '(a)' ) '    tourname digraph.'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_IS_TOURNAMENT reports if a'
-  write ( *, '(a)' ) '    digraph is a tournament.'
-
-  call digraph_adj_tournament_random ( lda, nnode, seed, adj )
-
-  call digraph_adj_print ( adj, lda, nnode, '  A random tournament digraph:' )
-
-  call digraph_adj_is_tournament ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The digraph is NOT a tournament.'
-  else
-    write ( *, '(a)' ) '  The digraph IS a tournament.'
-  end if
-
-  return
-end 
-subroutine test016
-
-!*****************************************************************************80
-!
-!! TEST016 tests DIGRAPH_ADJ_IS_TRANSITIVE;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: lda = 12
-
-  integer adj(lda,lda)
-  integer nnode
-  integer result
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST016'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_IS_TRANSITIVE reports if a'
-  write ( *, '(a)' ) '    digraph is transitive;'
-
-  call digraph_adj_example_sixty ( adj, lda, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  call digraph_adj_is_transitive ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The digraph is NOT transitive.'
-  else
-    write ( *, '(a)' ) '  The digraph IS transitive.'
-  end if
-
-  return
-end 
-subroutine test017
-
-!*****************************************************************************80
-!
-!! TEST017 tests DIGRAPH_ADJ_RANDOM;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer nedge
-  integer seed
-
-  seed = 123456789
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST017'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_RANDOM returns a random digraph.'
-  write ( *, '(a)' ) ' '
-
-  nedge = 10
-  write ( *, '(a,i8)' ) '  Number of edges requested = ', nedge
-
-  call digraph_adj_random ( lda, nnode, nedge, seed, adj )
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-!
-!  Count the edges.
-!
-  call digraph_adj_edge_count ( adj, lda, nnode, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of edges is ', nedge
-
-  return
-end
-subroutine test018
-
-!*****************************************************************************80
-!
-!! TEST018 tests DIGRAPH_ADJ_TO_DIGRAPH_ARC;
-!
-!    1->---2-->---3
-!    A     V      V
-!    6--<--5--<---4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-  integer, parameter :: maxarc = 10
-
-  integer adj(lda,nnode)
-  integer inode(maxarc)
-  integer jnode(maxarc)
-  integer narc
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST018'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_TO_DIGRAPH_ARC converts a digraph in'
-  write ( *, '(a)' ) '  adjacency form to arc list form;'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(2,3) = 1
-  adj(3,4) = 1
-  adj(4,5) = 1
-  adj(5,6) = 1
-  adj(6,2) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph in adjacency form:' )
-
-  call digraph_adj_to_digraph_arc ( adj, lda, nnode, maxarc, narc, &
-    inode, jnode )
-
-  call digraph_arc_print ( narc, inode, jnode, &
-    '  The digraph in arc list form:' )
-
-  return
-end
-subroutine test019
-
-!*****************************************************************************80
-!
-!! TEST019 tests DIGRAPH_ADJ_TO_DIGRAPH_INC;
-!
-!    1->---2-->---3
-!        A V      V
-!      6<--5--<---4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-  integer, parameter :: maxarc = 10
-
-  integer adj(lda,nnode)
-  integer inc(lda,maxarc)
-  integer narc
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST019'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_TO_DIGRAPH_INC converts a digraph in'
-  write ( *, '(a)' ) '  adjacency form to incidence matrix form;'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(2,3) = 1
-  adj(3,4) = 1
-  adj(4,5) = 1
-  adj(5,6) = 1
-  adj(6,2) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph in adjacency form:' )
-
-  call digraph_adj_to_digraph_inc ( adj, lda, nnode, maxarc, narc, inc )
-
-  call digraph_inc_print ( lda, nnode, narc, inc, &
-    '  The digraph in incidence form:' )
-
-  return
-end
-subroutine test020
-
-!*****************************************************************************80
-!
-!! TEST020 tests DIGRAPH_ADJ_TOP_SORT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 13
-
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer dad(nnode)
-  integer node_list(nnode)
-  integer order(nnode)
-  integer visit(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST020'
-  write ( *, '(a)' ) '  DIGRAPH_ADJ_TOP_SORT does a topological sort'
-  write ( *, '(a)' ) '    of an acyclic digraph.'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,3) = 1
-  adj(1,6) = 1
-
-  adj(5,4) = 1
-
-  adj(6,4) = 1
-  adj(6,5) = 1
-
-  adj(7,3) = 1
-  adj(7,5) = 1
-  adj(7,8) = 1
-
-  adj(8,9) = 1
-
-  adj(10,7) = 1
-  adj(10,11) = 1
-  adj(10,12) = 1
-  adj(10,13) = 1
-
-  adj(12,7) = 1
-  adj(12,13) = 1
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
- 
-  call digraph_adj_top_sort ( adj, lda, nnode, dad, visit, node_list )
-
-  call i4vec_print ( nnode, dad, '  Nodes and "Dads":' )
-
-  call i4vec_print ( nnode, visit, '  Nodes and order of visit:' )
-
-  call i4vec_print ( nnode, node_list, '  Nodes and reverse topological order:' )
-!
-!  Invert the listing to get a permutation.
-!
-  order(1:nnode) = node_list(1:nnode)
-
-  call perm_inv ( nnode, order )
-!
-!  Apply reordering and print adjacency matrix.
-!
-  call i4mat_perm ( lda, nnode, adj, order )
-
-  call digraph_adj_print ( adj, lda, nnode, '  The reordered digraph:' )
-
-  return
-end 
-subroutine test021
-
-!*****************************************************************************80
-!
-!! TEST021 tests DIGRAPH_ARC_DEGREE.
-!
-!  5--2--10--1--3--6
-!         |  |  | /
-!         8  |  9
-!         |  |  
-!         4--7  
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 11
-  integer, parameter :: nnode = 10
-
-  integer indegree(nnode)
-  integer inode(nedge)
-  integer jnode(nedge)
-  integer outdegree(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST021'
-  write ( *, '(a)' ) '  For a digraph described by an arc list:'
-  write ( *, '(a)' ) '  DIGRAPH_ARC_DEGREE computes the degree of the nodes;'
-
-  inode = (/ 1, 1,  1, 2,  2, 3, 3, 4, 4, 6,  8 /)
-  jnode = (/ 3, 7, 10, 5, 10, 6, 9, 7, 8, 9, 10 /)
-
-  call digraph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call digraph_arc_degree ( nnode, nedge, inode, jnode, indegree, outdegree )
-
-  call i4vec2_print ( nnode, indegree, outdegree, '  Node, Indegree, Outdegree' )
-
-  return
-end 
-subroutine test022
-
-!*****************************************************************************80
-!
-!! TEST022 tests DIGRAPH_ARC_EULER_CIRC_NEXT, DIGRAPH_ARC_IS_EULERIAN.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: maxstack = 130
-  integer, parameter :: nedge = 10
-  integer, parameter :: nnode = 5
-
-  integer circuit(nedge)
-  integer i
-  integer indegree(nnode)
-  integer, dimension ( nedge ) :: inode = (/ 1, 3, 1, 5, 2, 4, 2, 4, 3, 5 /)
-  integer, dimension ( nedge ) :: jnode = (/ 2, 1, 4, 1, 3, 2, 5, 3, 5, 4 /)
-  logical more
-  integer ncan(nedge)
-  integer outdegree(nnode)
-  integer result
-  integer stack(maxstack)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST022'
-  write ( *, '(a)' ) '  For a digraph described by an arc list:'
-  write ( *, '(a)' ) '  DIGRAPH_ARC_IS_EULERIAN checks if a graph'
-  write ( *, '(a)' ) '    has an Euler circuit.'
-  write ( *, '(a)' ) '  DIGRAPH_ARC_EULER_CIRC_NEXT finds the next'
-  write ( *, '(a)' ) '    Euler circuit of a graph.'
-  write ( *, '(a)' ) ' '
-
-  call digraph_arc_print ( nedge, inode, jnode, '  The digraph:' )
-
-  call digraph_arc_is_eulerian ( nnode, nedge, inode, jnode, indegree, &
-    outdegree, result )
-
-  if ( result == 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The digraph is NOT eulerian.'
-    return
-  else if ( result == 1 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The digraph has an eulerian path,'
-    write ( *, '(a)' ) '  but not an eulerian circuit.'
-  else if ( result == 2 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The digraph has an eulerian circuit.'
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-  i = 0
-
-  more = .false.
-
-  do
-
-    call digraph_arc_euler_circ_next ( nedge, inode, jnode, circuit, stack, &
-      maxstack, ncan, more )
-
-    if ( .not. more ) then
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,20i3)' ) i, circuit(1:nedge)
-
-  end do
-
-  return
-end
-subroutine test023
-
-!*****************************************************************************80
-!
-!! TEST023 tests DIGRAPH_ARC_TO_DIGRAPH_ADJ.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: maxedge = 20
-  integer, parameter :: maxnode = 20
-  integer, parameter :: lda = maxnode
-
-  integer adj(lda,maxnode)
-  integer inode(maxedge)
-  integer jnode(maxedge)
-  integer nedge
-  integer nnode
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST023'
-  write ( *, '(a)' ) '  DIGRAPH_ARC_TO_DIGRAPH_ADJ converts an arclist'
-  write ( *, '(a)' ) '    digraph to an adjacency digraph.'
-  write ( *, '(a)' ) ' '
-
-  call digraph_arc_example_cycler ( maxedge, nedge, inode, jnode )
-
-  call digraph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call digraph_arc_to_digraph_adj ( nedge, inode, jnode, adj, lda, nnode )
-
-  call digraph_adj_print ( adj, lda, nnode, '  The digraph:' )
-
-  return
-end
-subroutine test024
-
-!*****************************************************************************80
-!
-!! TEST024 tests FACE_CHECK.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: max_edge = 30
-  integer, parameter :: max_order = 4
-  integer, parameter :: max_face = 10
-
-  integer edge(4,max_edge)
-  integer face(max_order,max_face)
-  integer face_object(max_face)
-  integer face_order(max_face)
-  integer face_rank(max_face)
-  integer face_tier(max_face)
-  integer i
-  integer j
-  integer num_edge
-  integer num_face
-  integer num_object
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST024'
-  write ( *, '(a)' ) '  FACE_CHECK checks faces;'
-!
-!  Get the problem data.
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  max_face =  ', max_face
-  write ( *, '(a,i8)' ) '  max_order = ', max_order
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Get a test example'
-
-  call face_example_pieces ( face, face_order, max_face, max_order, num_face )
-!
-!  List the problem data.
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'Face, Order, Nodes'
-  write ( *, '(a)' ) ' '
-  do i = 1, num_face
-    write ( *, '(10i3)' ) i, face_order(i), ( face(j,i), j = 1, face_order(i) )
-  end do
-!
-!  Check the problem data.
-!
-  call face_check ( edge, face, face_object, face_order, face_rank, &
-    face_tier, max_edge, max_order, num_edge, num_face, num_object )
-
-  return
-end
-subroutine test025
-
-!*****************************************************************************80
-!
-!! TEST025 tests GRAPH_ADJ_BFS.
-!
-!  This example is from page 22 of
-!
-!  Alan Gibbons,
-!  Algorithmic Graph Theory,
-!  Cambridge University Press, 1985
-!  ISBN 0-521-28881-9
-!
-!  The correct result is
-!
-!  Node  Idad   Ideep Iorder
-!
-!   1      0       1    1
-!   2      1       2    2
-!   3      1       2    3
-!   4      1       2    4
-!   5      1       2    5
-!   6      1       2    6
-!   7      1       2    7
-!   8      1       2    8
-!   9      0       3    9
-!  10      9       4   10
-!  11     10       5   12
-!  12     10       5   13
-!  13      9       4   11
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 13
-  integer, parameter :: lda = nnode
-
-  integer i
-  integer adj(lda,nnode)
-  integer dad(nnode)
-  integer deep(nnode)
-  integer order(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST025'
-  write ( *, '(a)' ) '  GRAPH_ADJ_BFS sets up a breadth-first'
-  write ( *, '(a)' ) '    traversal of a graph.'
-  write ( *, '(a)' ) ' '
- 
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,3) = 1
-  adj(1,4) = 1
-  adj(1,5) = 1
-  adj(1,6) = 1
-  adj(1,7) = 1
-  adj(1,8) = 1
- 
-  adj(2,1) = 1
-  adj(2,5) = 1
-  adj(2,6) = 1
-  adj(2,8) = 1
- 
-  adj(3,1) = 1
-  adj(3,4) = 1
-  adj(3,7) = 1
- 
-  adj(4,1) = 1
-  adj(4,3) = 1
- 
-  adj(5,1) = 1
-  adj(5,2) = 1
- 
-  adj(6,1) = 1
-  adj(6,2) = 1
- 
-  adj(7,1) = 1
-  adj(7,3) = 1
- 
-  adj(8,1) = 1
-  adj(8,2) = 1
- 
-  adj(9,10) = 1
-  adj(9,13) = 1
- 
-  adj(10,9) = 1
-  adj(10,11) = 1
-  adj(10,12) = 1
-  adj(10,13) = 1
- 
-  adj(11,10) = 1
-  adj(11,12) = 1
- 
-  adj(12,10) = 1
-  adj(12,11) = 1
- 
-  adj(13,9) = 1
-  adj(13,10) = 1
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
- 
-  call graph_adj_bfs ( adj, lda, nnode, dad, deep, order )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  I, dad(i), deep(i), order(i)'
-  write ( *, '(a)' ) ' '
- 
-  do i = 1, nnode
-    write ( *, '(4i8)' )  i, dad(i), deep(i), order(i)
-  end do
- 
-  return
-end
-subroutine test026
-
-!*****************************************************************************80
-!
-!! TEST026 tests GRAPH_ADJ_BIPARTITE_RANDOM, GRAPH_ADJ_IS_BIPARTITE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode1 = 4
-  integer, parameter :: nnode2 = 6
-  integer, parameter :: nnode = nnode1 + nnode2
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer nedge
-  integer nedge2
-  integer result
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST026'
-  write ( *, '(a)' ) '  GRAPH_ADJ_BIPARTITE_RANDOM returns a random ' // &
-    'bipartite graph;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_IS_BIPARTITE reports if a graph is bipartite.'
-  write ( *, '(a)' ) ' '
-
-  write ( *, '(a,i8)' ) '  Number of nodes in set 1 is ', nnode1
-  write ( *, '(a,i8)' ) '  Number of nodes in set 2 is ', nnode2
-
-  call graph_adj_bipartite_random ( lda, nnode1, nnode2, seed, nedge, adj )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  call graph_adj_is_bipartite ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT bipartite.'
-  else
-    write ( *, '(a)' ) '  The graph IS bipartite.'
-  end if
-!
-!  Count the edges.
-!
-  call graph_adj_edge_count ( adj, lda, nnode, nedge2 )
-
-  write ( *, '(a,i8)' ) '  Total number of edges is   ', nedge
-  write ( *, '(a,i8)' ) '  Counted number of edges is ', nedge2
-
-  return
-end 
-subroutine test027
-
-!*****************************************************************************80
-!
-!! TEST027 tests GRAPH_ADJ_BLOCK.
-!
-!  The correct result is
-!
-!  3 blocks
-!
-!  Node  Idad  Iorder
-!
-!     1     0      -1
-!     2     1       2
-!     3     4       5
-!     4     1      -4
-!     5     4       6
-!     6     2       3
-!
-!  Revised adjacency matrix:
-!
-!    0 1 0 3 3 1
-!    1 0 0 0 0 1
-!    0 0 0 2 0 0
-!    3 0 2 0 3 0
-!    3 0 0 3 0 0
-!    1 1 0 0 0 0
-!
-!  The three blocks are defined by the edges:
-!
-!  1: (6,1), (2,6), (1,2)
-!
-!  2: (4,3)
-!
-!  3: (1,4), (4,5), (5,1)
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-
-  integer dad(nnode)
-  integer order(nnode)
-  integer nblock
-  integer stack(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST027'
-  write ( *, '(a)' ) '  GRAPH_ADJ_BLOCK finds the blocks in a graph.'
-  write ( *, '(a)' ) ' '
- 
-  adj(1:nnode,1:nnode) = 0
- 
-  adj(1,2) = 1
-  adj(1,4) = 1
-  adj(1,5) = 1
-  adj(1,6) = 1
- 
-  adj(2,1) = 1
-  adj(2,6) = 1
- 
-  adj(3,4) = 1
- 
-  adj(4,1) = 1
-  adj(4,3) = 1
-  adj(4,5) = 1
- 
-  adj(5,1) = 1
-  adj(5,4) = 1
- 
-  adj(6,1) = 1
-  adj(6,2) = 1
- 
-  call graph_adj_block ( adj, lda, nnode, dad, order, stack, nblock )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of blocks = ', nblock
-
-  call i4vec2_print ( nnode, dad, order, '  I, DAD(I), ORDER(I)' )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
- 
-  return
-end
-subroutine test028
-
-!*****************************************************************************80
-!
-!! TEST028 tests GRAPH_ADJ_CLOSURE, GRAPH_ADJ_REDUCE.
-!
-!    1--5      2
-!    | /|
-!    |/ |      8--3--7
-!    4  6
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 8
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer i
-  integer j
-
-  do i = 1, nnode
-    do j = 1, nnode
-      if ( i == j ) then
-        adj(i,j) = 1
-      else
-        adj(i,j) = 0
-      end if
-    end do
-  end do
-
-  adj(1,4) = 1
-  adj(1,5) = 1
-
-  adj(3,7) = 1
-  adj(3,8) = 1
-
-  adj(4,1) = 1
-  adj(4,5) = 1
-
-  adj(5,1) = 1
-  adj(5,4) = 1
-  adj(5,6) = 1
-
-  adj(6,5) = 1
-
-  adj(7,3) = 1
-
-  adj(8,3) = 1
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST028'
-  write ( *, '(a)' ) '  GRAPH_ADJ_CLOSURE finds the transitive closure '
-  write ( *, '(a)' ) '    of a graph;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_REDUCE finds the transitive reduction'
-  write ( *, '(a)' ) '    of a graph.'
-
-  call graph_adj_print ( adj, lda, nnode, '  The adjacency matrix for G:' )
-
-  call graph_adj_closure ( adj, lda, nnode )
-
-  call graph_adj_print ( adj, lda, nnode, &
-    '  Adjacency matrix for H, the transitive closure of G:' )
-
-  call graph_adj_reduce ( adj, nnode )
-
-  call graph_adj_print ( adj, lda, nnode, &
-    '  Adjacency matrix for G2, the transitive reduction of H:' )
-
-  call graph_adj_closure ( adj, lda, nnode )
-
-  call graph_adj_print ( adj, lda, nnode, &
-    '  Adjacency matrix for H2, the transitive closure of G2:' )
-
-  return
-end
-subroutine test029
-
-!*****************************************************************************80
-!
-!! TEST029 tests GRAPH_ADJ_COLOR_NEXT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 4
-  integer, parameter :: lda = nnode
-  integer, parameter :: maxstack = 20
-
-  integer adj(lda,nnode)
-  integer color(nnode)
-  integer i
-  integer j
-  logical more
-  integer ncan(nnode)
-  integer :: ncolor = 3
-  integer stack(maxstack)
-
-  data ( ( adj(i,j), j = 1, nnode ), i = 1, nnode) / &
-    0, 1, 0, 1, &
-    1, 0, 1, 0, &
-    0, 1, 0, 1, &
-    1, 0, 1, 0 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST029'
-  write ( *, '(a)' ) '  GRAPH_ADJ_COLOR_NEXT produces colorings of a graph'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  The number of colors available is ', ncolor
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Possible node colorings:'
-  write ( *, '(a)' ) ' '
-
-  more = .false.
-
-  do
-
-    call graph_adj_color_next ( adj, lda, nnode, ncolor, color, stack, &
-      maxstack, ncan, more )
-
-    if ( .not. more ) then
-      exit
-    end if
-
-    write ( *, '(19i4)' ) color(1:nnode)
-
-  end do
-
-  return
-end
-subroutine test030
-
-!*****************************************************************************80
-!
-!! TEST030 tests GRAPH_ADJ_CONNECT_RANDOM, GRAPH_ADJ_IS_EDGE_CONNECTED, GRAPH_ADJ_IS_NODE_CONNECTED.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 8
-  integer, parameter :: nnode = 6
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer result
-  integer seed
-
-  seed = 123456789
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST030'
-  write ( *, '(a)' ) '  GRAPH_ADJ_CONNECT_RANDOM returns a random connected graph;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_IS_EDGE_CONNECTED reports if a'
-  write ( *, '(a)' ) '    graph is edgewise connected;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_IS_NODE_CONNECTED reports if a'
-  write ( *, '(a)' ) '    graph is node connected;'
-  write ( *, '(a)' ) ' '
-
-  write ( *, '(a,i8)' ) '  Number of nodes is ', nnode
-  write ( *, '(a,i8)' ) '  Number of edges is ', nedge
-
-  call graph_adj_connect_random ( lda, nnode, nedge, seed, adj )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-!
-!  Check connectedness.
-!
-  call graph_adj_is_edge_connected ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT edgewise connected.'
-  else
-    write ( *, '(a)' ) '  The graph IS edgewise connected.'
-  end if
-
-  call graph_adj_is_node_connected ( adj, lda, nnode, result )
-
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT nodewise connected.'
-  else
-    write ( *, '(a)' ) '  The graph IS nodewise connected.'
-  end if
-
-  return
-end 
-subroutine test031
-
-!*****************************************************************************80
-!
-!! TEST031 tests GRAPH_ADJ_CONNECT_RANDOM, GRAPH_ADJ_IS_EDGE_CONNECTED, and
-!                GRAPH_ADJ_IS_NODE_CONNECTED, GRAPH_ADJ_IS_TREE;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: nedge = nnode - 1
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer result
-  integer seed
-
-  seed = 123456789
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST031'
-  write ( *, '(a)' ) '  GRAPH_ADJ_CONNECT_RANDOM returns a random connected graph;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_IS_EDGE_CONNECTED reports if a'
-  write ( *, '(a)' ) '    graph is edgewise connected;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_IS_NODE_CONNECTED reports if a'
-  write ( *, '(a)' ) '    graph is node connected;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_IS_TREE reports if a graph is a tree.'
-  write ( *, '(a)' ) ' '
-
-  write ( *, '(a,i8)' ) '  Number of nodes is ', nnode
-  write ( *, '(a,i8)' ) '  Number of edges is ', nedge
-
-  call graph_adj_connect_random ( lda, nnode, nedge, seed, adj )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-!
-!  Check connectedness.
-!
-  call graph_adj_is_edge_connected ( adj, lda, nnode, result )
-
-  write ( *, '(a)' ) ' '
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT edgewise connected.'
-  else
-    write ( *, '(a)' ) '  The graph IS edgewise connected.'
-  end if
-
-  call graph_adj_is_node_connected ( adj, lda, nnode, result )
-
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT nodewise connected.'
-  else
-    write ( *, '(a)' ) '  The graph IS nodewise connected.'
-  end if
-!
-!  Check arboricity.
-!
-  call graph_adj_is_tree ( adj, lda, nnode, result )
-
-  if ( result == 0 ) then
-    write ( *, '(a)' ) '  The graph is NOT a tree.'
-  else
-    write ( *, '(a)' ) '  The graph IS a tree.'
-  end if
-
-  return
-end 
-subroutine test032
-
-!*****************************************************************************80
-!
-!! TEST032 tests GRAPH_ADJ_CYCLE.
-!
-!  5--2--10--1--3--6
-!         |  |  | /
-!         8  |  9
-!         |  |  
-!         4--7  
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: maxstack = 100
-  integer, parameter :: nnode = 10
-
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer dad(nnode)
-  integer i
-  integer order(nnode)
-  integer stack(maxstack)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST032'
-  write ( *, '(a)' ) '  GRAPH_ADJ_CYCLE searches for cycles in a graph.'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,3) = 1
-  adj(1,7) = 1
-  adj(1,10) = 1
-
-  adj(2,5) = 1
-  adj(2,10) = 1
-
-  adj(3,1) = 1
-  adj(3,6) = 1
-  adj(3,9) = 1
-
-  adj(4,7) = 1
-  adj(4,8) = 1
-
-  adj(5,2) = 1
-
-  adj(6,3) = 1
-  adj(6,9) = 1
-
-  adj(7,1) = 1
-  adj(7,4) = 1
- 
-  adj(8,4) = 1
-  adj(8,10) = 1
-
-  adj(9,3) = 1
-  adj(9,6) = 1
-
-  adj(10,1) = 1
-  adj(10,2) = 1
-  adj(10,8) = 1
-   
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  call graph_adj_cycle ( adj, lda, nnode, dad, order, maxstack, stack )
-
-  call i4vec2_print ( nnode, dad, order, '  Node, Dad, Order' )
-
-  write ( *, '(a)' ) ' ' 
-  write ( *, '(a)' ) '  Adjacency matrix with cycles marked.'
-  write ( *, '(a)' ) ' '
-
-  do i = 1, nnode
-    write ( *, '(10i3)') adj(i,1:nnode)
-  end do
-
-  return
-end 
-subroutine test033
-
-!*****************************************************************************80
-!
-!! TEST033 tests GRAPH_ADJ_DEGREE, GRAPH_ADJ_DEGREE_MAX, GRAPH_ADJ_DEGREE_SEQ.
-!
-!
-!  5--2--10--1--3--6
-!         |  |  | /
-!         8  |  9
-!         |  |  
-!         4--7  
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 10
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer degree(nnode)
-  integer degree_max
-  integer degree_seq(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST033'
-  write ( *, '(a)' ) '  For a graph:'
-  write ( *, '(a)' ) '  GRAPH_ADJ_DEGREE computes the degree of the nodes;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_DEGREE_MAX computes the maximum'
-  write ( *, '(a)' ) '    degree of the nodes;'
-  write ( *, '(a)' ) '  GRAPH_ADJ_DEGREE_SEQ computes the degree sequence;'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,3) = 1
-  adj(1,7) = 1
-  adj(1,10) = 1
-
-  adj(2,5) = 1
-  adj(2,10) = 1
-
-  adj(3,1) = 1
-  adj(3,6) = 1
-  adj(3,9) = 1
-
-  adj(4,7) = 1
-  adj(4,8) = 1
-
-  adj(5,2) = 1
-
-  adj(6,3) = 1
-  adj(6,9) = 1
-
-  adj(7,1) = 1
-  adj(7,4) = 1
- 
-  adj(8,4) = 1
-  adj(8,10) = 1
-
-  adj(9,3) = 1
-  adj(9,6) = 1
-
-  adj(10,1) = 1
-  adj(10,2) = 1
-  adj(10,8) = 1
-   
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  call graph_adj_degree ( adj, lda, nnode, degree )
-
-  call i4vec_print ( nnode, degree, '  Node degrees:' )
-
-  call graph_adj_degree_seq ( adj, lda, nnode, degree_seq )
-
-  call i4vec_print ( nnode, degree_seq, '  Degree sequence:' )
-
-  call graph_adj_degree_max ( adj, lda, nnode, degree_max )
-
-  write ( *, '(a)' ) ' ' 
-  write ( *, '(a,i8)' ) '  Maximum node degree is ', degree_max
-  write ( *, '(a)' ) ' '
-
-  return
-end 
-subroutine test034
-
-!*****************************************************************************80
-!
-!! TEST034 tests GRAPH_ADJ_DFS.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 13
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer dad(nnode)
-  integer order(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST034'
-  write ( *, '(a)' ) '  GRAPH_ADJ_DFS does depth first search of graph.'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,3) = 1
-  adj(1,6) = 1
-  adj(1,7) = 1
-
-  adj(5,4) = 1
-  adj(5,7) = 1
-
-  adj(6,5) = 1
-
-  adj(8,9) = 1
-
-  adj(10,11) = 1
-  adj(10,12) = 1
-  adj(10,13) = 1
-
-  adj(12,13) = 1
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  call graph_adj_dfs ( adj, lda, nnode, dad, order )
-
-  call i4vec2_print ( nnode, dad, order, '  Node, Dad, Order' )
-
-  return
-end 
-subroutine test0335
-
-!*****************************************************************************80
-!
-!! TEST0335 tests GRAPH_ADJ_EIGEN.
-!
-!
-!  5--2--10--1--3--6
-!         |  |  | /
-!         8  |  9
-!         |  |
-!         4--7
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 10
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  real ( kind = 8 ) eigen(nnode)
-  integer neigen
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0335'
-  write ( *, '(a)' ) '  For a graph:'
-  write ( *, '(a)' ) '  GRAPH_ADJ_EIGEN computes the eigenvalues.'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,3) = 1
-  adj(1,7) = 1
-  adj(1,10) = 1
-
-  adj(2,5) = 1
-  adj(2,10) = 1
-
-  adj(3,1) = 1
-  adj(3,6) = 1
-  adj(3,9) = 1
-
-  adj(4,7) = 1
-  adj(4,8) = 1
-
-  adj(5,2) = 1
-
-  adj(6,3) = 1
-  adj(6,9) = 1
-
-  adj(7,1) = 1
-  adj(7,4) = 1
-
-  adj(8,4) = 1
-  adj(8,10) = 1
-
-  adj(9,3) = 1
-  adj(9,6) = 1
-
-  adj(10,1) = 1
-  adj(10,2) = 1
-  adj(10,8) = 1
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  call graph_adj_eigen ( adj, lda, nnode, neigen, eigen )
-
-  call r8vec_print ( neigen, eigen, '  The eigenvalues:' )
-
-  if ( neigen < nnode ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  Warning!  Not all eigenvalues were computed.'
-  end if
-
-  return
-end
-subroutine test035
-
-!*****************************************************************************80
-!
-!! TEST035 tests GRAPH_ADJ_DFS_2.
-!
-!  Discussion:
-!
-!    This example is from page 22 of
-!
-!    Alan Gibbons,
-!    Algorithmic Graph Theory,
-!    Cambridge University Press, 1985
-!    ISBN 0-521-28881-9
-!
-!    The correct result is
-!
-!    Node  Idad  Iorder
-!
-!     1      0      1
-!     2      1      2
-!     3      1      6
-!     4      3      7
-!     5      2      3
-!     6      2      4
-!     7      3      8
-!     8      2      5
-!     9      0      9
-!    10      9     10
-!    11     10     11
-!    12     10     12
-!    13     10     13
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 13
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer dad(nnode)
-  integer order(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST035'
-  write ( *, '(a)' ) '  GRAPH_ADJ_DFS_2 sets up depth-first traversal'
-  write ( *, '(a)' ) '    of a graph described by an adjacency matrix.'
-  write ( *, '(a)' ) ' '
- 
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,3) = 1
-  adj(1,4) = 1
-  adj(1,5) = 1
-  adj(1,6) = 1
-  adj(1,7) = 1
-  adj(1,8) = 1
- 
-  adj(2,1) = 1
-  adj(2,5) = 1
-  adj(2,6) = 1
-  adj(2,8) = 1
- 
-  adj(3,1) = 1
-  adj(3,4) = 1
-  adj(3,7) = 1
- 
-  adj(4,1) = 1
-  adj(4,3) = 1
- 
-  adj(5,1) = 1
-  adj(5,2) = 1
- 
-  adj(6,1) = 1
-  adj(6,2) = 1
- 
-  adj(7,1) = 1
-  adj(7,3) = 1
- 
-  adj(8,1) = 1
-  adj(8,2) = 1
- 
-  adj(9,10) = 1
-  adj(9,13) = 1
- 
-  adj(10,9) = 1
-  adj(10,11) = 1
-  adj(10,12) = 1
-  adj(10,13) = 1
- 
-  adj(11,10) = 1
-  adj(11,12) = 1
- 
-  adj(12,10) = 1
-  adj(12,11) = 1
- 
-  adj(13,9) = 1
-  adj(13,10) = 1
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
- 
-  call graph_adj_dfs_2 ( adj, lda, nnode, dad, order )
- 
-  call i4vec2_print ( nnode, dad, order, '  I, DAD(I), ORDER(I)' )
- 
-  return
-end
-subroutine test036
-
-!*****************************************************************************80
-!
-!! TEST036 tests GRAPH_ADJ_HAM_NEXT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 20
-  integer, parameter :: lda = nnode
-  integer, parameter :: maxstack = 100
-
-  integer adj(lda,nnode)
-  integer circuit(nnode)
-  integer i
-  integer j
-  logical more
-  integer ncan(nnode)
-  integer stack(maxstack)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST036'
-  write ( *, '(a)' ) '  GRAPH_ADJ_HAM_NEXT produces Hamilton circuits;'
-  write ( *, '(a)' ) ' '
- 
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,8) = 1
-  adj(1,20) = 1
-
-  adj(2,1) = 1
-  adj(2,3) = 1
-  adj(2,15) = 1
-
-  adj(3,2) = 1
-  adj(3,7) = 1
-  adj(3,4) = 1
-
-  adj(4,3) = 1
-  adj(4,5) = 1
-  adj(4,14) = 1
-
-  adj(5,4) = 1
-  adj(5,6) = 1
-  adj(5,12) = 1
-
-  adj(6,10) = 1
-  adj(6,7) = 1
-
-  adj(7,3) = 1
-  adj(7,6) = 1
-  adj(7,8) = 1
-
-  adj(8,1) = 1
-  adj(8,7) = 1
-  adj(8,9) = 1
-
-  adj(9,8) = 1
-  adj(9,10) = 1
-  adj(9,19) = 1
-
-  adj(10,6) = 1
-  adj(10,9) = 1
-  adj(10,11) = 1
-
-  adj(11,10) = 1
-  adj(11,12) = 1
-  adj(11,18) = 1
-
-  adj(12,5) = 1
-  adj(12,11) = 1
-  adj(12,13) = 1
-
-  adj(13,12) = 1
-  adj(13,14) = 1
-  adj(13,17) = 1
-
-  adj(14,4) = 1
-  adj(14,13) = 1
-  adj(14,15) = 1
-
-  adj(15,2) = 1
-  adj(15,14) = 1
-  adj(15,16) = 1
-
-  adj(16,15) = 1
-  adj(16,17) = 1
-  adj(16,20) = 1
-
-  adj(17,13) = 1
-  adj(17,16) = 1
-  adj(17,18) = 1
-
-  adj(18,11) = 1
-  adj(18,17) = 1
-  adj(18,19) = 1
-
-  adj(19,9) = 1
-  adj(19,18) = 1
-  adj(19,20) = 1
-
-  adj(20,1) = 1
-  adj(20,16) = 1
-  adj(20,19) = 1
- 
-  do i = 1, nnode-1
-    do j = i+1, nnode
-      if ( adj(i,j) == 1 ) then
-        adj(j,i) = 1
-      end if
-    end do
-  end do
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-
-  i = 0
-
-  more = .false.
-
-  do
-
-    call graph_adj_ham_next ( adj, lda, nnode, circuit, stack, maxstack, &
-      ncan, more )
-
-    if ( .not. more ) then
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,20i3)' ) i, circuit(1:nnode)
-
-  end do
- 
-  return
-end
-subroutine test0365
-
-!*****************************************************************************80
-!
-!! TEST0365 tests GRAPH_ADJ_HAM_NEXT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-  integer, parameter :: lda = nnode
-  integer, parameter :: maxstack = 100
-
-  integer adj(lda,nnode)
-  integer circuit(nnode)
-  integer i
-  logical more
-  integer ncan(nnode)
-  integer stack(maxstack)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0365'
-  write ( *, '(a)' ) '  GRAPH_ADJ_HAM_NEXT produces Hamilton circuits;'
-  write ( *, '(a)' ) ' '
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,4) = 1
-  adj(1,6) = 1
- 
-  adj(2,1) = 1
-  adj(2,3) = 1
-  adj(2,7) = 1
- 
-  adj(3,2) = 1
-  adj(3,4) = 1
-  adj(3,6) = 1
- 
-  adj(4,1) = 1
-  adj(4,3) = 1
-  adj(4,7) = 1
- 
-  adj(5,6) = 1
-  adj(5,7) = 1
-  adj(5,9) = 1
- 
-  adj(6,1) = 1
-  adj(6,3) = 1
-  adj(6,5) = 1
-  adj(6,8) = 1
- 
-  adj(7,2) = 1
-  adj(7,4) = 1
-  adj(7,5) = 1
- 
-  adj(8,6) = 1
-  adj(8,9) = 1
- 
-  adj(9,5) = 1
-  adj(9,8) = 1
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-
-  i = 0
-
-  more = .false.
-
-  do
-
-    call graph_adj_ham_next ( adj, lda, nnode, circuit, stack, maxstack, &
-      ncan, more )
-
-    if ( .not. more ) then
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(2x,i3,2x,20i3)' ) i, circuit(1:nnode)
-
-  end do
- 
-  return
-end
-subroutine test0366
-
-!*****************************************************************************80
-!
-!! TEST0366 tests GRAPH_ADJ_HAM_NEXT_BRUTE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer circuit(nnode)
-  integer i
-  integer iset
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0366'
-  write ( *, '(a)' ) '  GRAPH_ADJ_HAM_NEXT_BRUTE seeks circuits'
-  write ( *, '(a)' ) '    in a graph which visit every node.'
-  write ( *, '(a)' ) '  A brute force algorithm is used.'
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,4) = 1
-  adj(1,6) = 1
- 
-  adj(2,1) = 1
-  adj(2,3) = 1
-  adj(2,7) = 1
- 
-  adj(3,2) = 1
-  adj(3,4) = 1
-  adj(3,6) = 1
- 
-  adj(4,1) = 1
-  adj(4,3) = 1
-  adj(4,7) = 1
- 
-  adj(5,6) = 1
-  adj(5,7) = 1
-  adj(5,9) = 1
- 
-  adj(6,1) = 1
-  adj(6,3) = 1
-  adj(6,5) = 1
-  adj(6,8) = 1
- 
-  adj(7,2) = 1
-  adj(7,4) = 1
-  adj(7,5) = 1
- 
-  adj(8,6) = 1
-  adj(8,9) = 1
- 
-  adj(9,5) = 1
-  adj(9,8) = 1
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
- 
-  iset = 0
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-
-  i = 0
-  
-  do
- 
-    call graph_adj_ham_next_brute ( adj, lda, nnode, circuit, iset )
- 
-    if ( iset == 0 ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) '  No more circuits were found.'
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(2x,i3,2x,20i3)' ) i, circuit(1:nnode)
-
-  end do
- 
-  return
-end
-subroutine test037
-
-!*****************************************************************************80
-!
-!! TEST037 tests GRAPH_ADJ_RANDOM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 10
-  integer, parameter :: nnode = 6
-
-  integer adj(nnode,nnode)
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST037'
-  write ( *, '(a)' ) '  GRAPH_ADJ_RANDOM returns a random graph;'
-  write ( *, '(a)' ) ' '
-
-  write ( *, '(a,i8)' ) '  Number of edges requested = ', nedge
-
-  call graph_adj_random ( nnode, nedge, seed, adj )
-
-  call graph_adj_print ( adj, nnode, nnode, '  The graph:' )
-
-  return
-end
-subroutine test0375
-
-!*****************************************************************************80
-!
-!! TEST0375 tests GRAPH_ADJ_RANDOM2.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    18 September 2006
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 20
-  integer, parameter :: test_num = 3
-
-  integer adj(nnode,nnode)
-  real ( kind = 8 ) eigen(nnode)
-  integer nedge
-  integer neigen
-  real ( kind = 8 ) prob
-  real ( kind = 8 ), dimension ( test_num ) :: prob_test = (/ &
-    0.25D+00, 0.40D+00,  0.65D+00 /)
-  integer seed
-  integer test
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0375'
-  write ( *, '(a)' ) '  GRAPH_ADJ_RANDOM2 returns a random graph, for which'
-  write ( *, '(a)' ) '  edges are generated with a given probability.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Here, we show the effect of increasing connectivity'
-  write ( *, '(a)' ) '  on the singularity of the adjacency matrix.'
-
-  do test = 1, test_num
-
-    prob = prob_test(test)
-
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) ' '
-    write ( *, '(a,g14.6)' ) '  Probability of edge generation = ', prob
-
-    call graph_adj_random2 ( nnode, prob, seed, nedge, adj )
-
-    write ( *, '(a,i8)' ) '  Number of edges generated = ', nedge
-    write ( *, '(a,g14.6)' ) '  Ratio = ', &
-      real ( nedge, kind = 8 ) / real ( ( nnode * ( nnode - 1 ) ) / 2, kind = 8 )
-
-    call graph_adj_print ( adj, nnode, nnode, '  The graph:' )
-
-    call graph_adj_eigen ( adj, nnode, nnode, neigen, eigen )
-
-    call r8vec_print ( neigen, eigen, '  The eigenvalues:' )
-
-  end do
-
-  return
-end 
-subroutine test038
-
-!*****************************************************************************80
-!
-!! TEST038 tests GRAPH_ADJ_SPAN_TREE, GRAPH_ADJ_SPAN_TREE_ENUM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 13
-  integer, parameter :: lda = nnode
-
-  integer adj(lda,nnode)
-  integer inode(nnode-1)
-  integer jnode(nnode-1)
-  integer tree_num
-
-  adj(1:nnode,1:nnode) = 0
-
-  adj(1,2) = 1
-  adj(1,3) = 1
-  adj(1,4) = 1
-  adj(1,5) = 1
-  adj(1,6) = 1
-  adj(1,7) = 1
-  adj(1,8) = 1
- 
-  adj(2,1) = 1
-  adj(2,5) = 1
-  adj(2,6) = 1
-  adj(2,8) = 1
- 
-  adj(3,1) = 1
-  adj(3,4) = 1
-  adj(3,7) = 1
- 
-  adj(4,1) = 1
-  adj(4,3) = 1
- 
-  adj(5,1) = 1
-  adj(5,2) = 1
- 
-  adj(6,1) = 1
-  adj(6,2) = 1
- 
-  adj(7,1) = 1
-  adj(7,3) = 1
- 
-  adj(8,1) = 1
-  adj(8,2) = 1
-  adj(8,9) = 1
-
-  adj(9,8) = 1 
-  adj(9,10) = 1
-  adj(9,13) = 1
- 
-  adj(10,9) = 1
-  adj(10,11) = 1
-  adj(10,12) = 1
-  adj(10,13) = 1
- 
-  adj(11,10) = 1
-  adj(11,12) = 1
- 
-  adj(12,10) = 1
-  adj(12,11) = 1
- 
-  adj(13,9) = 1
-  adj(13,10) = 1
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST038'
-  write ( *, '(a)' ) '  GRAPH_ADJ_SPAN_TREE constructs a spanning tree of a graph.'
-  write ( *, '(a)' ) '  GRAPH_ADJ_SPAN_TREE_ENUM enumerates the spanning trees'
-  write ( *, '(a)' ) '     of a graph.'
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  call graph_adj_span_tree_enum ( adj, lda, nnode, tree_num )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Total number of spanning trees is ', tree_num
-
-  call graph_adj_span_tree ( adj, lda, nnode, inode, jnode )
-
-  call graph_arc_print ( nnode-1, inode, jnode, '  The spanning tree:' )
-
-  return
-end
-subroutine test039
-
-!*****************************************************************************80
-!
-!! TEST039 tests GRAPH_ARC_EDGE_CON2.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 17
-  integer, parameter :: nnode = 9
-
-  integer edge_con
-  integer, dimension ( nedge ) :: inode = &
-    (/ 6,2,3,6,7,1,4,7,3,4,9,6,5,4,2,9,4 /)
-  integer, dimension ( nedge ) :: jnode = &
-    (/ 8,5,1,3,2,8,3,5,8,1,2,1,9,8,6,7,2 /)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST039'
-  write ( *, '(a)' ) '  GRAPH_ARC_EDGE_CON2 finds graph edge connectivity.'
-
-  call graph_arc_print ( nedge, inode, jnode, '  The arc list of the graph:' )
-
-  call graph_arc_edge_con2 ( nnode, nedge, inode, jnode, edge_con )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  The computed edge connectivity is ', edge_con
-
-  return
-end
-subroutine test040
-
-!*****************************************************************************80
-!
-!  TEST040 tests GRAPH_ARC_MATCH.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  integer, parameter :: nedge = 14
-  integer, parameter :: nnode = 12
-
-  integer, dimension ( nedge ) :: inode = &
-    (/ 6, 9, 3,  4, 11, 6, 4, 5,  6, 10, 3, 4, 1, 3 /)
-  integer, dimension ( nedge ) :: jnode = &
-    (/ 2, 7, 7, 10,  5, 8, 6, 7, 12,  2, 1, 2, 5, 5 /)
-  integer, dimension ( nnode ) :: match
-  integer, dimension ( nnode ) :: type = (/ &
-    1, 1, 2, 1, 2, 2, 1, 2, 2, 2, 1, 1 /)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST040'
-  write ( *, '(a)' ) '  GRAPH_ARC_MATCH finds a maximal matching in a graph.'
-
-  call graph_arc_print ( nedge, inode, jnode, '  The edge list of the graph:' )
-
-  call i4vec_print ( nnode, type, '  Nodes and their types:' )
-
-  call graph_arc_match ( nnode, nedge, inode, jnode, type, match )
-
-  call i4vec_print ( nnode, match, '  Node and matching node:' )
-
-  return
-end
-subroutine test041
-
-!*****************************************************************************80
-!
-!! TEST041 tests GRAPH_ARC_MIN_PATH.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-  integer, parameter :: lda = nnode
-  integer, parameter :: nedge = 6
-
-  real ( kind = 8 ), save, dimension ( nedge ) :: cost = (/ &
-    1.0D+00, 1.0D+00, 3.0D+00, 2.0D+00, 2.0D+00, 5.0D+00 /)
-  real ( kind = 8 ) dist(lda,nnode)
-  integer, save, dimension ( nedge ) :: inode = (/ 1, 1, 2, 2, 3, 3 /)
-  integer istart
-  integer istop
-  integer, save, dimension ( nedge ) :: jnode = (/ 2, 3, 3, 5, 4, 5 /)
-  integer num_path
-  integer path(nnode)
-  real ( kind = 8 ) path_length
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST041'
-  write ( *, '(a)' ) '  GRAPH_ARC_MIN_PATH computes the shortest path from one'
-  write ( *, '(a)' ) '  node to another.'
-  write ( *, '(a)' ) ' '
-
-  call graph_arc_weight_print ( nedge, inode, jnode, cost, &
-    '  The weighted graph:' )
-
-  dist(1:nnode,1:nnode) = 0.0D+00
-
-  do istart = 1, nnode
-    do istop = istart+1, nnode
-      call graph_arc_min_path ( nnode, nedge, inode, jnode, cost, istart, &
-        istop, num_path, path, path_length )
-      dist(istart,istop) = path_length
-      dist(istop,istart) = path_length
-    end do
-  end do
-
-  call graph_dist_print ( dist, lda, nnode, &
-    '  The distance matrix constructed by GRAPH_ARC_MIN_PATH:' )
- 
-  istart = 4
-  istop = 5
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  The routine actually also computes the path.'
-  write ( *, '(a,i8)' ) '  For instance, starting at node ', istart
-  write ( *, '(a,i8)' ) '  we compute the shortest path to node ', istop
-
-  call graph_arc_min_path ( nnode, nedge, inode, jnode, cost, istart, &
-    istop, num_path, path, path_length )
-
-  call i4vec_print ( num_path, path, '  The path:' )
-
-  return
-end
-subroutine test042
-
-!*****************************************************************************80
-!
-!! TEST042 tests GRAPH_ARC_MIN_SPAN_TREE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 10
-  integer, parameter :: nnode = 5
-
-  real ( kind = 8 ), dimension ( nedge ) :: cost = &
-    (/ 100.0, 125.0, 120.0, 110.0, 40.0, 65.0, 60.0, 45.0, 55.0, 50.0 /)
-  real ( kind = 8 ), dimension ( nnode-1) :: ctree
-  integer, dimension ( nedge ) :: inode = (/ 1, 1, 1, 1, 2, 2, 2, 3, 3, 4 /)
-  integer i
-  integer itree(nnode-1)
-  integer j
-  integer, dimension ( nedge ) :: jnode = (/ 2, 3, 4, 5, 3, 4, 5, 4, 5, 5 /)
-  integer jtree(nnode-1)
-  real ( kind = 8 ) tree_cost
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST042'
-  write ( *, '(a)' ) '  GRAPH_ARC_MIN_SPAN_TREE finds a minimum length'
-  write ( *, '(a)' ) '  spanning tree.'
-  write ( *, '(a)' ) ' '
-
-  call graph_arc_weight_print ( nedge, inode, jnode, cost, &
-    '  The weighted graph:' )
-
-  call graph_arc_min_span_tree ( nnode, nedge, inode, jnode, cost, &
-    itree, jtree, tree_cost )
-
-  do i = 1, nnode-1
-    ctree(i) = 0.0D+00
-    do j = 1, nedge
-      if ( ( inode(j) == itree(i) .and. jnode(j) == jtree(i) ) .or. &
-           ( inode(j) == jtree(i) .and. jnode(j) == itree(i) ) ) then
-        ctree(i) = cost(j)
-        exit
-      end if
-    end do
-  end do
-
-  call graph_arc_weight_print ( nnode-1, itree, jtree, ctree, &
-    '  The minimal spanning tree:' )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  The length of the minimal tree is ', sum ( ctree )
-
-  return
-end
-subroutine test043
-
-!*****************************************************************************80
-!
-!! TEST043 tests GRAPH_ARC_SPAN_FOREST.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 14
-  integer, parameter :: nedge = 10
-
-  integer component(nnode)
-  integer, save, dimension ( nedge ) :: inode = &
-    (/  2,  4,  1,  7,  5,  2,  6,  2,  3,  4 /)
-  integer, save, dimension ( nedge ) :: jnode = &
-    (/  3,  7,  9, 11,  8,  5, 10,  8,  8, 11 /)
-  integer ncomp
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST043'
-  write ( *, '(a)' ) '  GRAPH_ARC_SPAN_FOREST'
-  write ( *, '(a)' ) '  computes a spanning forest for a graph'
- 
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_span_forest ( nnode, nedge, inode, jnode, ncomp, component )
-
-  call graph_arc_print ( nedge, inode, jnode, &
-    '  The reordered endpoint array:' )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of connected components = ', ncomp
-
-  call i4vec_print ( nnode, component, '  Node component membership:' )
-
-  return
-end
-subroutine test044
-
-!*****************************************************************************80
-!
-!! TEST044 tests GRAPH_ARC_TO_DIGRAPH_ARC.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 8
-  integer, parameter :: maxarc = 2 * nedge
-
-  integer iarc(maxarc)
-  integer, dimension ( nedge ) :: inode = (/ 1, 1, 1, 2, 3, 4, 2, 4 /)
-  integer jarc(maxarc)
-  integer, dimension ( nedge ) :: jnode = (/ 2, 1, 4, 1, 2, 1, 3, 2 /)
-  integer narc
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST044'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_TO_DIGRAPH_ARC makes a directed graph'
-  write ( *, '(a)' ) '    from an undirected one.'
-
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_to_digraph_arc ( iarc, jarc, inode, jnode, maxarc, narc, &
-    nedge )
-
-  call digraph_arc_print ( narc, iarc, jarc, '  The digraph:' )
-
-  return
-end
-subroutine test045
-
-!*****************************************************************************80
-!
-!! TEST045 tests GRAPH_ARC_TO_GRAPH_ADJ.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 8
-  integer, parameter :: maxnode = 5
-  integer, parameter :: lda = maxnode
-
-  integer adj(lda,maxnode)
-  integer, dimension ( nedge ) :: inode = (/ 1, 1, 1, 2, 3, 4, 2, 4 /)
-  integer, dimension ( nedge ) :: jnode = (/ 2, 1, 4, 1, 2, 1, 3, 2 /)
-  integer nnode
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST045'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_TO_GRAPH_ADJ converts an arclist'
-  write ( *, '(a)' ) '    graph to an adjacency graph.'
-  write ( *, '(a)' ) ' '
-
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_to_graph_adj ( nedge, inode, jnode, adj, lda, nnode )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-
-  return
-end
-subroutine test046
-
-!*****************************************************************************80
-!
-!! TEST046 tests GRAPH_ARC_COMPLEMENT, GRAPH_ARC_EDGE_SORT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: maxedge = 90
-  integer, parameter :: maxnode = 10
-
-  integer inode(maxedge)
-  integer inode2(maxedge)
-  integer jnode(maxedge)
-  integer jnode2(maxedge)
-  integer nedge
-  integer nedge2
-  integer nnode
-  real ( kind = 8 ) x(maxnode)
-  real ( kind = 8 ) y(maxnode)
-  real ( kind = 8 ) z(maxnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST046'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_COMPLEMENT computes the complement'
-  write ( *, '(a)' ) '    of a graph described by its edge array;'
-  write ( *, '(a)' ) '  GRAPH_ARC_EDGE_SORT sorts the edge array.'
-
-  call graph_arc_example_diamond ( inode, jnode, maxedge, nedge, nnode, x, y, z )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of edges in original graph is ', nedge
-  write ( *, '(a,i8)' ) '  Number of nodes is ', nnode
- 
-  call graph_arc_edge_sort ( nedge, inode, jnode )
- 
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
- 
-  call graph_arc_complement ( inode, jnode, inode2, jnode2, maxedge, nedge, &
-    nedge2, nnode )
- 
-  write ( *, '(a,i8)' ) 'Number of edges in complement is ', nedge2
-
-  call graph_arc_edge_sort ( nedge2, inode2, jnode2 )
- 
-  call graph_arc_print ( nedge, inode, jnode, '  The complement graph:' )
- 
-  return
-end
-subroutine test047
-
-!*****************************************************************************80
-!
-!! TEST047 tests GRAPH_ARC_DEGREE.
-!
-!  5--2--10--1--3--6
-!         |  |  | /
-!         8  |  9
-!         |  |  
-!         4--7  
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 11
-  integer, parameter :: nnode = 10
-
-  integer degree(nnode)
-  integer inode(nedge)
-  integer jnode(nedge)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST047'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_DEGREE computes the degree of the nodes;'
-
-  inode = (/ 1, 1,  1, 2,  2, 3, 3, 4, 4, 6,  8 /)
-  jnode = (/ 3, 7, 10, 5, 10, 6, 9, 7, 8, 9, 10 /)
-
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_degree ( nnode, nedge, inode, jnode, degree )
-
-  call i4vec_print ( nnode, degree, '  The node degrees:' )
-
-  return
-end 
-subroutine test048
-
-!*****************************************************************************80
-!
-!! TEST048 tests GRAPH_ARC_DEGREE.
-!
-!
-!  5--2--100-1--3--0
-!         |  |  | /
-!        88  |  9
-!         |  |  
-!      (-4)--7  
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 11
-
-  integer, dimension ( nedge ) :: inode = &
-    (/ 1, 1,   1, 2,   2, 3, 3, -4, -4, 0,  88 /)
-  integer, dimension ( nedge ) :: jnode = &
-    (/ 3, 7, 100, 5, 100, 0, 9,  7, 88, 9, 100 /)
-  integer mnode
-  integer nnode
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST048'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_NODE_COUNT counts the nodes and'
-  write ( *, '(a)' ) '  finds the highest label.'
-
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_node_count ( nedge, inode, jnode, mnode, nnode )
-
-  write ( *, '(a,i8)' ) '  Number of nodes is    ', nnode
-  write ( *, '(a,i8)' ) '  Maximum node label is ', mnode
-
-  return
-end 
-subroutine test049
-
-!*****************************************************************************80
-!
-!! TEST049 tests GRAPH_ARC_EULER_CIRC_NEXT, GRAPH_ARC_IS_EULERIAN.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: maxstack = 130
-  integer, parameter :: nedge = 10
-  integer, parameter :: nnode = 5
-
-  integer circuit(nedge)
-  integer degree(nnode)
-  integer i
-  integer, dimension ( nedge ) :: inode = (/ 1, 1, 1, 1, 2, 2, 2, 3, 3, 4 /)
-  integer, dimension ( nedge ) :: jnode = (/ 2, 3, 4, 5, 3, 4, 5, 4, 5, 5 /)
-  logical more
-  integer ncan(nedge)
-  integer result
-  integer stack(maxstack)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST049'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_IS_EULERIAN checks if a graph has an'
-  write ( *, '(a)' ) '    Euler circuit.'
-  write ( *, '(a)' ) '  GRAPH_ARC_EULER_CIRC_NEXT finds the next'
-  write ( *, '(a)' ) '    Euler circuit of a graph.'
-  write ( *, '(a)' ) ' '
-
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_is_eulerian ( nnode, nedge, inode, jnode, degree, result )
-
-  if ( result == 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The graph is NOT eulerian.'
-    return
-  else
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The graph is eulerian.'
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Circuits:'
-  write ( *, '(a)' ) ' '
-  i = 0
-  more = .false.
-
-  do
-
-    call graph_arc_euler_circ_next ( nedge, inode, jnode, circuit, stack, &
-      maxstack, ncan, more )
-
-    if ( .not. more ) then
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,20i3)' ) i, circuit(1:nedge)
-
-  end do
-
-  return
-end
-subroutine test050
-
-!*****************************************************************************80
-!
-!! TEST050 tests GRAPH_ARC_EULER_CIRC.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 10
-  integer, parameter :: nnode = 5
-
-  integer circuit(nedge)
-  integer degree(nnode)
-  integer, dimension ( nedge ) :: inode = (/ 1, 1, 1, 1, 2, 2, 2, 3, 3, 4 /)
-  integer, dimension ( nedge ) :: jnode = (/ 2, 3, 4, 5, 3, 4, 5, 4, 5, 5 /)
-  integer result
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST050'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_IS_EULERIAN determines if a graph'
-  write ( *, '(a)' ) '    is Eulerian;'
-  write ( *, '(a)' ) '  GRAPH_ARC_EULER_CIRC returns an Euler circuit'
-  write ( *, '(a)' ) '    of a graph.'
-
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_is_eulerian ( nnode, nedge, inode, jnode, degree, result )
-
-  if ( result == 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The graph is NOT eulerian.'
-    return
-  else
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The graph is eulerian.'
-  end if
-
-  call graph_arc_euler_circ ( nnode, nedge, inode, jnode, circuit )
-
-  call i4vec_print ( nedge, circuit, '  The nodes in the Euler circuit:' )
-
-  return
-end
-subroutine test051
-
-!*****************************************************************************80
-!
-!! TEST051 tests GRAPH_ARC_SPAN_TREE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nedge = 18
-  integer, parameter :: nnode = 13
-
-  integer dad(nnode)
-  integer inode(nedge)
-  integer jnode(nedge)
-
-  inode(1) = 1
-  jnode(1) = 2
-  inode(2) = 1
-  jnode(2) = 3
-  inode(3) = 1
-  jnode(3) = 4
-  inode(4) = 1
-  jnode(4) = 5
-  inode(5) = 1
-  jnode(5) = 6
-  inode(6) = 1
-  jnode(6) = 7
-  inode(7) = 1
-  jnode(7) = 8
- 
-  inode(8) = 2
-  jnode(8) = 5
-  inode(9) = 2
-  jnode(9) = 6
-  inode(10) = 2
-  jnode(10) = 8
- 
-  inode(11) = 3
-  jnode(11) = 4
-  inode(12) = 3
-  jnode(12) = 7
- 
-  inode(13) = 9
-  jnode(13) = 10
-  inode(14) = 9
-  jnode(14) = 13
- 
-  inode(15) = 10
-  jnode(15) = 11
-  inode(16) = 10
-  jnode(16) = 12
-  inode(17) = 10
-  jnode(17) = 13
- 
-  inode(18) = 11
-  jnode(18) = 12
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST051'
-  write ( *, '(a)' ) '  For a graph described by an arc list:'
-  write ( *, '(a)' ) '  GRAPH_ARC_SPAN_TREE constructs a spanning tree.'
-  write ( *, '(a)' ) ' '
-
-  call graph_arc_print ( nedge, inode, jnode, '  The graph:' )
-
-  call graph_arc_span_tree ( nedge, inode, jnode, nnode, dad )
-
-  call i4vec_print ( nnode, dad, '  Nodes and Parent Nodes:' )
-
-  return
-end
-subroutine test052
-
-!*****************************************************************************80
-!
-!! TEST052 tests GRAPH_CHRO.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6 
-  integer, parameter :: nedge = 12
-  integer, parameter :: maxstack = nnode * nedge
-
-  integer i
-  integer iarray(nnode)
-  integer iendpt(2,nedge)
-  integer j
-  integer jarray(nnode)
-  integer karray(nnode)
-  integer stack(2,maxstack)
-
-  data ( ( iendpt(i,j), i = 1, 2 ), j = 1, nedge ) / &
-    1,2, 1,3, 1,4, 1,5, 2,3, 2,4, 2,6, 3,5, 3,6, 4,5, 4,6, 5,6 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST052'
-  write ( *, '(a)' ) '  GRAPH_CHRO finds the chromatic polynomial of a graph.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  The end point array:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(19i4)' ) ( iendpt(1,i), i = 1, nedge )
-  write ( *, '(19i4)' ) ( iendpt(2,i), i = 1, nedge )
- 
-  call graph_chro ( nnode, nedge, iendpt, iarray, jarray, karray, &
-    stack, maxstack )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  The chromatic polynomial:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Power sum form:'
-  write ( *, '(19i4)' ) iarray(1:nnode)
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Tutte or tree form:'
-  write ( *, '(19i4)' ) jarray(1:nnode)
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Stirling form:'
-  write ( *, '(19i4)' ) karray(1:nnode)
- 
-  return
-end
-subroutine test053
-
-!*****************************************************************************80
-!
-!! TEST053 tests GRAPH_DIST_ALL.
-!
-!  The graph is:
-!
-!  N3 --3-- N2 --4-- N4 --5-- N5
-!
-!     \      |      /
-!       6    2     1
-!        \   |    /
-!
-!            N1
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-  integer, parameter :: lda = nnode
-
-  real ( kind = 8 ) dinfin
-  real ( kind = 8 ) dist(lda,nnode)
-  integer i
-  real ( kind = 8 ) path_dist(lda,nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST053'
-  write ( *, '(a)' ) '  GRAPH_DIST_ALL computes the distance between'
-  write ( *, '(a)' ) '    all pairs of nodes.'
-  write ( *, '(a)' ) ' '
-
-  dinfin = 1000.0D+00
- 
-  dist(1:nnode,1:nnode) = dinfin
-
-  do i = 1, nnode
-    dist(i,i) = 0.0D+00
-  end do
- 
-  dist(1,2) = 2.0D+00
-  dist(1,3) = 6.0D+00
-  dist(1,4) = 1.0D+00
-
-  dist(2,1) = 2.0D+00
-  dist(2,3) = 3.0D+00
-  dist(2,4) = 4.0D+00
-
-  dist(3,1) = 6.0D+00
-  dist(3,2) = 3.0D+00
-
-  dist(4,1) = 1.0D+00
-  dist(4,2) = 4.0D+00
-  dist(4,5) = 5.0D+00
-
-  dist(5,4) = 5.0D+00
- 
-  call graph_dist_print ( dist, lda, nnode, &
-    '  Immediate node distance matrix:' )
-
-  call graph_dist_all ( dist, dinfin, lda, nnode, path_dist )
- 
-  call graph_dist_print ( path_dist, lda, nnode, &
-    '  Total node distance matrix:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  Note that "infinity" is represented by ', dinfin
- 
-  return
-end
-subroutine test054
-
-!*****************************************************************************80
-!
-!! TEST054 tests GRAPH_DIST_CHECK.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 15
-  integer, parameter :: lda = nnode
-
-  real ( kind = 8 ) a(lda,nnode)
-  integer i
-  integer ierror
-  integer j
-
-  data ( ( a(i,j), j = 1, nnode ), i = 1, nnode ) / &
-     0., 29., 82., 46., 68., 52., 72., 42., 51., 55., 29., 74., 23., 72., 46., &
-    29.,  0., 55., 46., 42., 43., 43., 23., 23., 31., 41., 51., 11., 52., 21., &
-    82., 55.,  0., 68., 46., 55., 23., 43., 41., 29., 79., 21., 64., 31., 51., &
-    46., 46., 68.,  0., 82., 15., 72., 31., 62., 42., 21., 51., 51., 43., 64., &
-    68., 42., 46., 82.,  0., 74., 23., 52., 21., 46., 82., 58., 46., 65., 23., &
-    52., 43., 55., 15., 74.,  0., 61., 23., 55., 31., 33., 37., 51., 29., 59., &
-    72., 43., 23., 72., 23., 61.,  0., 42., 23., 31., 77., 37., 51., 46., 33., &
-    42., 23., 43., 31., 52., 23., 42.,  0., 33., 15., 37., 33., 33., 31., 37., &
-    51., 23., 41., 62., 21., 55., 23., 33.,  0., 29., 62., 46., 29., 51., 11., &
-    55., 31., 29., 42., 46., 31., 31., 15., 29.,  0., 51., 21., 41., 23., 37., &
-    29., 41., 79., 21., 82., 33., 77., 37., 62., 51.,  0., 65., 42., 59., 61., &
-    74., 51., 21., 51., 58., 37., 37., 33., 46., 21., 65.,  0., 61., 11., 55., &
-    23., 11., 64., 51., 46., 51., 51., 33., 29., 41., 42., 61.,  0., 62., 23., &
-    72., 52., 31., 43., 65., 29., 46., 31., 51., 23., 59., 11., 62.,  0., 59., &
-    46., 21., 51., 64., 23., 59., 33., 37., 11., 37., 61., 55., 23., 59.,  0. /
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST054'
-  write ( *, '(a)' ) '  GRAPH_DIST_CHECK checks a distance matrix.'
-
-  call graph_dist_check ( a, lda, nnode, ierror )
-
-  if ( ierror == 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'The distance matrix passed all tests.'
-  else
-    write ( *, '(a)' ) ' '
-    write ( *, '(a,i8)' ) 'The distance matrix failed test ', ierror
-  end if
-
-  return
-end
-subroutine test055
-
-!*****************************************************************************80
-!
-!! TEST055 tests GRAPH_DIST_MIN_SPAN_TREE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-  integer, parameter :: lda = nnode
-
-  real ( kind = 8 ) dist(lda,nnode)
-  integer i
-  integer itree(nnode-1)
-  integer j
-  integer jtree(nnode-1)
-  real ( kind = 8 ) wtree(nnode-1)
-
-  data ( ( dist(i,j), i = 1, nnode ), j = 1, nnode ) / &
-       0.0D+00, 100.0D+00, 125.0D+00, 120.0D+00, 110.0D+00, &
-     100.0D+00,   0.0D+00,  40.0D+00,  65.0D+00,  60.0D+00, &
-     125.0D+00,  40.0D+00,   0.0D+00,  45.0D+00,  55.0D+00, &
-     120.0D+00,  65.0D+00,  45.0D+00,   0.0D+00,  50.0D+00, &
-     110.0D+00,  60.0D+00,  55.0D+00,  50.0D+00,   0.0D+00 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST055'
-  write ( *, '(a)' ) '  For a graph defined by a distance matrix,'
-  write ( *, '(a)' ) '  GRAPH_DIST_MIN_SPAN_TREE finds a minimum spanning tree.'
-  write ( *, '(a)' ) ' '
- 
-  call graph_dist_print ( dist, lda, nnode, '  The graph:' )
-
-  call graph_dist_min_span_tree ( lda, nnode, dist, itree, jtree )
- 
-  do i = 1, nnode-1
-    wtree(i) = dist(itree(i),jtree(i))
-  end do
- 
-  call graph_arc_weight_print ( nnode-1, itree, jtree, wtree, &
-    '  The minimal spanning tree:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  The length of the minimal tree is ', sum ( wtree )
- 
-  return
-end
-subroutine test056
-
-!*****************************************************************************80
-!
-!! TEST056 tests GRAPH_DIST_MIN_SPAN_TREE2.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-  integer, parameter :: lda = nnode
-
-  integer class(nnode)
-  real ( kind = 8 ) dist(lda,nnode)
-  integer i
-  integer itree(nnode-1)
-  integer j
-  integer jtree(nnode-1)
-  real ( kind = 8 ) wtree(nnode-1)
-
-  data ( ( dist(i,j), i = 1, nnode ), j = 1, nnode ) / &
-       0.0, 100.0, 125.0, 120.0, 110.0, &
-     100.0,   0.0,  40.0,  65.0,  60.0, &
-     125.0,  40.0,   0.0,  45.0,  55.0, &
-     120.0,  65.0,  45.0,   0.0,  50.0, &
-     110.0,  60.0,  55.0,  50.0,   0.0D+00 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST056'
-  write ( *, '(a)' ) '  For a graph defined by a distance matrix,'
-  write ( *, '(a)' ) '  GRAPH_DIST_MIN_SPAN_TREE2 finds a minimum spanning tree.'
-  write ( *, '(a)' ) ' '
- 
-  call graph_dist_print ( dist, lda, nnode, '  The graph:' )
-
-  call graph_dist_min_span_tree2 ( lda, nnode, dist, class, itree, jtree )
- 
-  do i = 1, nnode-1
-    wtree(i) = dist(itree(i),jtree(i))
-  end do
-
-  call graph_arc_weight_print ( nnode-1, itree, jtree, wtree, &
-    '  The minimal spanning tree:' )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  The length of the minimal tree is ', sum ( wtree )
- 
-  return
-end
-subroutine test057
-
-!*****************************************************************************80
-!
-!! TEST057 tests GRAPH_DIST_MIN_SPAN_TREE3.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-  integer, parameter :: lda = nnode
-
-  real ( kind = 8 ) dist(lda,nnode)
-  integer i
-  integer itree(nnode-1)
-  integer jtree(nnode-1)
-  integer j
-  real ( kind = 8 ) wtree(nnode-1)
-
-  data ( ( dist(i,j), i = 1, nnode ), j = 1, nnode ) / &
-       0.0, 100.0, 125.0, 120.0, 110.0, &
-     100.0,   0.0,  40.0,  65.0,  60.0, &
-     125.0,  40.0,   0.0,  45.0,  55.0, &
-     120.0,  65.0,  45.0,   0.0,  50.0, &
-     110.0,  60.0,  55.0,  50.0,   0.0D+00 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST057'
-  write ( *, '(a)' ) '  For a graph defined by a distance matrix,'
-  write ( *, '(a)' ) '  GRAPH_DIST_MIN_SPAN_TREE3 finds a minimum spanning tree.'
-  write ( *, '(a)' ) ' '
- 
-  call graph_dist_print ( dist, lda, nnode, '  The graph:' )
-
-  call graph_dist_min_span_tree3 ( lda, nnode, dist, itree, jtree )
-
-  do i = 1, nnode-1
-    wtree(i) = dist(itree(i),jtree(i))
-  end do
-
-  call graph_arc_weight_print ( nnode-1, itree, jtree, wtree, &
-    '  The minimal spanning tree:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  The length of the minimal tree is ', sum ( wtree )
- 
-  return
-end
-subroutine test058
-
-!*****************************************************************************80
-!
-!! TEST058 tests GRAPH_DIST_MIN_SPAN_TREE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 57
-  integer, parameter :: lda = nnode
-
-  real ( kind = 8 ) dist(lda,nnode)
-  character ( len = 80 ) :: file_name = '57_city_distances.txt'
-  integer i
-  integer ios
-  integer itree(nnode-1)
-  integer iunit
-  integer jtree(nnode-1)
-  real ( kind = 8 ) wtree(nnode-1)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST058'
-  write ( *, '(a)' ) '  GRAPH_DIST_MIN_SPAN_TREE finds a minimum '
-  write ( *, '(a)' ) '    spanning tree.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Read distance data for 57 cities from file.'
-!
-!  Read the data.
-!
-  call get_unit ( iunit )
-
-  open ( unit = iunit, file = file_name, status = 'old', iostat = ios )
-
-  if ( ios /= 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  Problems opening the file: ' // trim ( file_name )
-    write ( *, '(a)' ) '  The test was abandoned.'
-    return
-  end if
-
-  do i = 1, nnode
-
-    read ( iunit, *, iostat = ios ) dist(i,1:nnode)
-
-    if ( ios /= 0 ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) '  Problems reading the data.'
-      write ( *, '(a)' ) '  The test was abandoned.'
-      return
-    end if
-
-  end do
-
-  close ( unit = iunit )
-!
-!  Compute the tree.
-!
-  call graph_dist_min_span_tree ( lda, nnode, dist, itree, jtree )
- 
-  do i = 1, nnode-1
-    wtree(i) = dist(itree(i),jtree(i))
-  end do
- 
-  call graph_arc_weight_print ( nnode-1, itree, jtree, wtree, &
-    '  The weighted tree:' )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  The length of the minimal tree is ', sum ( wtree )
-
-  return
-end
-subroutine test059
-
-!*****************************************************************************80
-!
-!! TEST059 tests GRAPH_DIST_ONE.
-!
-!  Discussion:
-!
-!    This example appears on page 15 of the reference book by Gibbons.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-  integer, parameter :: lda = nnode
-
-  real ( kind = 8 ) dinfin
-  real ( kind = 8 ) dist(lda,nnode)
-  integer i
-  integer idad(nnode)
-  integer inode
-  integer path(nnode)
-  integer itemp(nnode)
-  integer j
-  integer length
-  real ( kind = 8 ) path_dist(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST059'
-  write ( *, '(a)' ) '  GRAPH_DIST_ONE computes the distance from one'
-  write ( *, '(a)' ) '    node to all others in a graph.'
-  write ( *, '(a)' ) ' '
-
-  dinfin = 1000.0D+00
- 
-  do i = 1, nnode
-    do j = 1, nnode
-      dist(i,j) = dinfin
-    end do
-    dist(i,i) = 0.0D+00
-  end do
- 
-  dist(1,2) = 1.0D+00
-  dist(1,3) = 3.0D+00
- 
-  dist(2,1) = 2.0D+00
-  dist(2,3) = 1.0D+00
-  dist(2,5) = 2.0D+00
- 
-  dist(3,4) = 2.0D+00
-  dist(3,5) = 3.0D+00
- 
-  dist(4,3) = 1.0D+00
- 
-  dist(5,1) = 1.0D+00
-  dist(5,2) = 3.0D+00
-  dist(5,4) = 6.0D+00
-
-  call graph_dist_print ( dist, lda, nnode, '  Edge Distance Matrix:' )
-
-  inode = 5
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) 'The starting node is ', inode
-  write ( *, '(a)' ) ' '
-
-  call graph_dist_one ( dist, dinfin, path_dist, idad, inode, path, &
-    lda, nnode )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Node    Distance   Path Idad'
-  write ( *, '(a)' ) ' '
- 
-  do i = 1, nnode
-    write ( *, '(i5,g14.6,2i5)' ) i, path_dist(i), path(i), idad(i)
-  end do
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  Note that "infinity" is represented by ', dinfin
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Here are the paths for each node:'
-  write ( *, '(a)' ) ' '
- 
-  do i = 1, nnode
-
-    length = 1
-    itemp(length) = i
- 
-    do while ( itemp(length) /= inode )
-      length = length+1
-      itemp(length) = idad(itemp(length-1))
-    end do
- 
-    write ( *, '(5i5)' ) itemp(1:length)
- 
-  end do
- 
-  return
-end
-subroutine test060
-
-!*****************************************************************************80
-!
-!! TEST060 tests VLA_TO_GRAPH_ARC, GRAPH_ARC_FACE, FACE_TO_IV;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: maxedge = 1000
-  integer, parameter :: maxface = 2000
-  integer, parameter :: maxnode = 1000
-  integer, parameter :: maxorder = 20
-
-  integer face(maxorder,maxface)
-  integer face_count(maxedge)
-  integer face_order(maxface)
-  character ( len = 80 ) :: file_in = 'fish_lines.vla'
-  character ( len = 80 ) :: file_out = 'fish_faces.iv'
-  integer ierror
-  integer iface(maxedge)
-  integer inode(maxedge)
-  integer jface(maxedge)
-  integer jnode(maxedge)
-  integer nedge
-  integer nface
-  integer nnode
-  real ( kind = 8 ) x(maxnode)
-  real ( kind = 8 ) y(maxnode)
-  real ( kind = 8 ) z(maxnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST060'
-  write ( *, '(a)' ) '  VLA_TO_GRAPH_ARC converts VLA edge data to a'
-  write ( *, '(a)' ) '    graph defined by arcs;'
-  write ( *, '(a)' ) '  GRAPH_ARC_FACE constructs the faces of an orientable graph.'
-  write ( *, '(a)' ) '  FACE_TO_IV writes face data to an IV file.'
-!
-!  Get the edge array for the graph.
-!
-  call vla_to_graph_arc ( file_in, maxedge, maxnode, nedge, nnode, inode, &
-    jnode, x, y, z, ierror )
-
-  if ( ierror /= 0 ) then
-    write ( *, '(a)' ) 'TEST060 - Error!'
-    write ( *, '(a)' ) '  VLA_TO_GRAPH_ARC returned an error.'
-    return
-  end if
-!
-!  Sort the edge array.
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Sort the edges:'
-
-  call graph_arc_edge_sort ( nedge, inode, jnode )
-!
-!  Determine the faces.
-!
-  write ( *, '(a)' ) '  Determine the faces:'
-
-  call graph_arc_face ( face, face_count, face_order, iface, jface, &
-    inode, jnode, maxface, maxorder, nedge, nface, nnode )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of faces found was ', nface
-  write ( *, '(a,i8)' ) '  Euler predicted ', nedge + 2 - nnode
-!
-!  Write the faces to an IV file.
-!
-  call face_to_iv ( file_out, face, face_order, inode, jnode, &
-    nedge, maxnode, maxface, maxorder, nnode, nface, x, y, z )
-
-  return
-end
-subroutine test061
-
-!*****************************************************************************80
-!
-!! TEST061 tests GRF_READ, GRAPH_ARC_TO_PS.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: maxedge = 500
-  integer, parameter :: maxnode = 100
-
-  integer, parameter :: lda = maxnode
-
-  integer adj(lda,maxnode)
-  character ( len = 80 ) :: file_grf = 'knightstour.grf'
-  character ( len = 80 ) :: file_ps = 'knightstour.eps'
-  integer i
-  integer inode(maxedge)
-  integer jnode(maxedge)
-  integer nedge
-  integer nnode
-  real ( kind = 8 ) x(maxnode)
-  real ( kind = 8 ) y(maxnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST061'
-  write ( *, '(a)' ) '  GRF_READ reads a GRF file,'
-  write ( *, '(a)' ) '  GRAPH_ARC_TO_PS writes a PostScript version of it.'
-
-  call grf_read ( file_grf, inode, jnode, maxedge, maxnode, nedge, nnode, x, y )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'Node, X, Y'
-  write ( *, '(a)' ) ' '
-
-  do i = 1, nnode
-    write ( *, '(i8,2g14.6)' ) i, x(i), y(i)
-  end do
-
-  call graph_arc_to_graph_adj ( nedge, inode, jnode, adj, lda, nnode )
-
-  call graph_adj_print ( adj, lda, nnode, '  The graph:' )
-!
-!  Now write out a PostScript version.
-!
-  call graph_arc_to_ps ( file_ps, inode, jnode, nedge, nnode, x, y )
-
-  return
-end
-subroutine test062
-
-!*****************************************************************************80
-!
-!! TEST062 tests GREEDY.
-!
-!  Discussion:
-!
-!    Random data is used in setting up the problem.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 15
-
-  real ( kind = 8 ) dist
-  integer ido
-  integer indx
-  integer maxit
-  integer nodeb(nnode)
-  integer nodeb1
-  integer noder(nnode)
-  integer noder1
-  integer seed
-  real ( kind = 8 ) tol
-  real ( kind = 8 ) total
-  real ( kind = 8 ) xb(nnode)
-  real ( kind = 8 ) xhi
-  real ( kind = 8 ) xlo
-  real ( kind = 8 ) xr(nnode)
-  real ( kind = 8 ) yb(nnode)
-  real ( kind = 8 ) yhi
-  real ( kind = 8 ) ylo
-  real ( kind = 8 ) yr(nnode)
-
-  seed = 123456789
-!
-!  IDO just tells us if this is the first or later trials.
-!
-  ido = 1
-!
-!  Set the maximum number of iterations.
-!
-  maxit = 10
-!
-!  Set the range of the X and Y coordinates.
-!
-  xhi = 10.0D+00
-  xlo = 0.0D+00
-  yhi = 5.0D+00
-  ylo = 3.0D+00
-!
-!  Set the relative tolerance for the stepwise distance decrease.
-!
-  tol = 0.05D+00
-!
-!  Say hello.
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST062'
-
-  write ( *, '(a)' ) '  GREEDY tries to minimize the total distance'
-  write ( *, '(a)' ) '    in a pairing of black and red nodes.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Try to find a pairing of two sets of nodes'
-  write ( *, '(a)' ) '  with a low discrepancy.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,g14.6)' ) '  Relative tolerance for step decrease = ', tol
-  write ( *, '(a,i8)' ) '  Maximum number of steps = ', maxit
-  write ( *, '(a,g14.6,a,g14.6)' ) '  X range is ', xlo,' to ', xhi
-  write ( *, '(a,g14.6,a,g14.6)' ) '  Y range is ', ylo,' to ', yhi
-!
-!  Make an arbitrary pairing of the nodes.
-!
-  do indx = 1, nnode
-    nodeb(indx) = indx
-    noder(indx) = indx
-  end do
-!
-!  Make up a random set of X, Y coordinates for the nodes.
-!
-  call r8vec_uniform ( nnode, xlo, xhi, seed, xb )
-  call r8vec_uniform ( nnode, xlo, xhi, seed, xr )
-  call r8vec_uniform ( nnode, ylo, yhi, seed, yb )
-  call r8vec_uniform ( nnode, ylo, yhi, seed, yr )
-!
-!  We will jump back here if we restart with a permuted NODER.
-!
-  do ido = 1, 2
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'Initial black node coordinates:'
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '    I   Black   X             Y'
-    write ( *, '(a)' ) ' '
- 
-    do indx = 1, nnode
-      write ( *, '(2i8,2g14.6)' ) indx, nodeb(indx), xb(indx), yb(indx)
-    end do
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'Initial red node coordinates:'
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '    I    Red    X             Y'
-    write ( *, '(a)' ) ' '
- 
-    do indx = 1, nnode
-      write ( *, '(2i8,2g14.6)' ) indx, noder(indx), xr(indx), yr(indx)
-    end do
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'Initial pairing of nodes:'
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '    I   Black  Red    Distance'
-    write ( *, '(a)' ) ' '
- 
-    do indx = 1, nnode
-      nodeb1 = nodeb(indx)
-      noder1 = noder(indx)
-      dist = sqrt ( ( xb(nodeb1) - xr(noder1) )**2 + &
-                    ( yb(nodeb1) - yr(noder1) )**2 )
-
-      write ( *, '(3i8,g14.6)' ) indx, nodeb1, noder1, dist
-    end do
- 
-    total = 0.0D+00
-    do indx = 1, nnode
-      nodeb1 = nodeb(indx)
-      noder1 = noder(indx)
-      total = total + sqrt ( ( xb(nodeb1) - xr(noder1) )**2 &
-                           + ( yb(nodeb1) - yr(noder1) )**2 )
-    end do
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a,g14.6)' ) 'Total discrepancy of initial pairing = ', total
-!
-!  Call GREEDY to seek a better pairing.
-!
-    call greedy ( maxit, nodeb, noder, nnode, tol, xb, xr, yb, yr )
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'Final black node coordinates:'
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '    I   Black   X             Y'
-    write ( *, '(a)' ) ' '
- 
-    do indx = 1, nnode
-      write ( *, '(2i8,2g14.6)' ) indx, nodeb(indx), xb(indx), yb(indx)
-    end do
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'Final red node coordinates:'
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '    I    Red    X             Y'
-    write ( *, '(a)' ) ' '
- 
-    do indx = 1, nnode
-      write ( *, '(2i8,2g14.6)' ) indx, noder(indx), xr(indx), yr(indx)
-    end do
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'Final pairing of nodes:'
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '    I   Black  Red    Distance'
-    write ( *, '(a)' ) ' '
- 
-    do indx = 1, nnode
-
-      nodeb1 = nodeb(indx)
-      noder1 = noder(indx)
-
-      dist = sqrt ( ( xb(nodeb1) - xr(noder1) )**2 &
-                  + ( yb(nodeb1) - yr(noder1) )**2 )
-
-      write ( *, '(3i8,g14.6)') indx, nodeb1, noder1, dist
-
-    end do
- 
-    total = 0.0D+00
-    do indx = 1, nnode
-      nodeb1 = nodeb(indx)
-      noder1 = noder(indx)
-      dist = sqrt ( ( xb(nodeb1) - xr(noder1) )**2 &
-                  + ( yb(nodeb1) - yr(noder1) )**2 )
-
-      total = total + dist
- 
-    end do
- 
-    write ( *, '(a)' ) ' '
-    write ( *, '(a,g14.6)' ) '  Total discrepancy of final pairing = ', total
-!
-!  On the second try, reverse the ordering of the red nodes.
-!  Any random permutation would be worth trying.
-!
-    if ( ido == 1 ) then
- 
-      do indx = 1, nnode / 2
-        call i4_swap ( noder(indx), noder(nnode+1-indx) )
-      end do
- 
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) '  Reversing NODER!'
- 
-    end if
-
-  end do
- 
-  return
-end
-subroutine test063
-
-!*****************************************************************************80
-!
-!! TEST063 tests MAZE_DIAM, MAZE_PATH, MAZE_PRINT, MAZE_RANDOM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: m = 8
-  integer, parameter :: n = 10
-
-  integer bar(m,n+1)
-  integer dad(m,n)
-  integer degree(m,n)
-  integer diam
-  integer flat(m+1,n)
-  integer i
-  integer istart
-  integer istop
-  integer j
-  integer jstart
-  integer jstop
-  integer path(m,n)
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST063'
-  write ( *, '(a)' ) '  MAZE_RANDOM: generate a random maze;'
-  write ( *, '(a)' ) '  MAZE_DIAM: find two far apart cells;'
-  write ( *, '(a)' ) '  MAZE_PATH: generate a path.'
-  write ( *, '(a)' ) '  MAZE_PRINT: print a maze.'
-!
-!  Print out the cell numbers for the maze.
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Cell numbers for the maze:'
-  write ( *, '(a)' ) ' '
-  do i = 1, m
-    write ( *, '(20i3)' ) ( (j-1)*m+i, j = 1, n )
-  end do
-!
-!  Get a random maze and print it.
-!
-  call maze_random ( m, n, seed, bar, dad, flat )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  A random maze:'
-  write ( *, '(a,i8)' ) '    Number of rows =   ', m
-  write ( *, '(a,i8)' ) '    Number of columns = ', n
-
-  istart = 0
-  jstart = 0
-
-  istop = 0
-  jstop = 0
-
-  call maze_print ( bar, flat, m, n, istart, jstart, istop, jstop, &
-    '  The maze:' )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Rooted tree representation:'
-  write ( *, '(a)' ) '  (0 is the root.  All other cells print the'
-  write ( *, '(a)' ) '  cell number of their parent on the tree.)'
-  write ( *, '(a)' ) ' '
-  do i = 1, m
-    write ( *, '(20i3)' ) dad(i,1:n)
-  end do
-!
-!  Get start and end points that are far apart and print the maze.
-!
-  call maze_diam ( bar, degree, diam, flat, m, n, path, istart, jstart, &
-    istop, jstop )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Random maze with far apart ends:'
-  write ( *, '(a,i8)' ) '    Diameter = ', diam
-  write ( *, '(a,2i8)' ) '    Starting cell = ', istart, jstart
-  write ( *, '(a,2i8)' ) '    Stopping cell = ', istop, jstop
-
-  call maze_print ( bar, flat, m, n, istart, jstart, istop, jstop, &
-    '  The maze:' )
-!
-!  Find a path and print it.
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Random maze with path from start to stop:'
-
-  call maze_path ( bar, flat, m, n, istart, jstart, istop, jstop )
-
-  call maze_print ( bar, flat, m, n, istart, jstart, istop, jstop, &
-    '  The maze' )
-
-  return
-end
-subroutine test064
-
-!*****************************************************************************80
-!
-!! TEST064 tests MAZE_PRINT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: m = 2
-  integer, parameter :: n = 3
- 
-  integer, parameter :: INDEF = -1
-  integer, parameter :: WALL = 0
-  integer, parameter :: OPEN = 1
-
-  integer bar(m,n+1)
-  integer flat(m+1,n)
-  integer istart
-  integer istop
-  integer jstart
-  integer jstop
-
-  bar(1:m,1:n+1) = WALL
-  flat(1:m+1,1:n) = WALL
-
-  bar(1,2) = OPEN
-  bar(1,4) = INDEF
-  bar(2,3) = OPEN
-
-  flat(1,3) = INDEF
-  flat(2,1) = OPEN
-  flat(2,2) = OPEN
-  flat(2,3) = OPEN
-  flat(3,1) = OPEN
-
-  istart = 2
-  jstart = 1
-
-  istop = 1
-  jstop = 3
-!
-!  Now mark the path.
-!
-  flat(2,1) = 2
-  bar(1,2) = 2
-  flat(2,2) = 2
-  bar(2,3) = 2
-  flat(2,3) = 2
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST064'
-  write ( *, '(a)' ) '  MAZE_PRINT prints a maze with path marked.'
-  write ( *, '(a)' ) ' '
-
-  call maze_print ( bar, flat, m, n, istart, jstart, istop, jstop, &
-    '  The maze:' )
-
-  return
-end
-subroutine test065
-
-!*****************************************************************************80
-!
-!! TEST065 tests NETWORK_FLOW_MAX.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 6
-  integer, parameter :: nedge = 20
-
-  integer i
-  integer icut(nnode)
-  integer icpflo(2,nedge)
-  integer iendpt(2,nedge)
-  integer :: isink = 6
-  integer :: isorce = 1
-  integer j
-  integer node_flow(nnode)
-
-  data ( ( iendpt(i,j), j = 1, nedge ), i = 1, 2 ) / &
-    1,2, 1,3, 2,3, 2,4, 2,5, 3,4, 3,5, 4,5, 4,6, 5,6, &
-    2,1, 3,1, 3,2, 4,2, 5,2, 4,3, 5,3, 5,4, 6,4, 6,5 /
- 
-  data ( ( icpflo(i,j), j = 1, nedge ), i = 1, 2 ) / &
-    3,0,7,0,2,0,5,0,4,0,1,0,4,0,2,0,8,0,3,0, &
-    0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST065'
-  write ( *, '(a)' ) '  NETWORK_FLOW_MAX finds the maximum flow on a network.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  The source is node ', isorce
-  write ( *, '(a,i8)' ) '  The sink is node   ', isink
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Endpoint array:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(20i3)' ) ( iendpt(1,i), i = 1, nedge )
-  write ( *, '(20i3)' ) ( iendpt(2,i), i = 1, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Input edge capacity array:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(20i3)' ) ( icpflo(1,i), i = 1, nedge)
- 
-  call network_flow_max ( nnode, nedge, iendpt, icpflo, isorce, &
-    isink, icut, node_flow )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Reordered endpoint array:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(20i3)' ) ( iendpt(1,i), i = 1, nedge )
-  write ( *, '(20i3)' ) ( iendpt(2,i), i = 1, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Output edge capacity/flow array:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(20i3)' ) ( icpflo(1,i), i = 1, nedge )
-  write ( *, '(20i3)' ) ( icpflo(2,i), i = 1, nedge )
-
-  call i4vec_print ( nnode, icut, '  Minimal node cut vector:' )
-
-  call i4vec_print ( nnode, node_flow, '  Nodal flow vector:' )
-
-  return
-end
-subroutine test066
-
-!*****************************************************************************80
-!
-!! TEST066 tests NODE_RELAX.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: max_cor3 = 100
-  integer, parameter :: max_face = 100
-  integer, parameter :: max_order = 5
-
-  real ( kind = 8 ) cor3(3,max_cor3)
-  real ( kind = 8 ) cor3_new(3,max_cor3)
-  integer cor3_num(max_cor3)
-  integer face(max_order,max_face)
-  integer face_order(max_face)
-  integer j
-  integer num_cor3
-  integer num_face
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST066'
-  write ( *, '(a)' ) '  NODE_RELAX smooths a surface.'
-
-  num_cor3 = 8
-
-  cor3(1,1) = 0.0D+00
-  cor3(2,1) = 0.0D+00
-  cor3(3,1) = 0.0D+00
-
-  cor3(1,2) = 1.0D+00
-  cor3(2,2) = 0.0D+00
-  cor3(3,2) = 0.0D+00
-
-  cor3(1,3) = 1.0D+00
-  cor3(2,3) = 1.0D+00
-  cor3(3,3) = 0.0D+00
-
-  cor3(1,4) = 0.0D+00
-  cor3(2,4) = 1.0D+00
-  cor3(3,4) = 0.0D+00
-
-  cor3(1,5) = 0.0D+00
-  cor3(2,5) = 0.0D+00
-  cor3(3,5) = 1.0D+00
-
-  cor3(1,6) = 1.0D+00
-  cor3(2,6) = 0.0D+00
-  cor3(3,6) = 1.0D+00
-
-  cor3(1,7) = 1.0D+00
-  cor3(2,7) = 1.0D+00
-  cor3(3,7) = 1.0D+00
-
-  cor3(1,8) = 0.0D+00
-  cor3(2,8) = 1.0D+00
-  cor3(3,8) = 1.0D+00
-
-  num_face = 6
-
-  face(1,1) = 1
-  face(2,1) = 4
-  face(3,1) = 3
-  face(4,1) = 2
-
-  face(1,2) = 2
-  face(2,2) = 6
-  face(3,2) = 7
-  face(4,2) = 3
-
-  face(1,3) = 3
-  face(2,3) = 7
-  face(3,3) = 8
-  face(4,3) = 4
-
-  face(1,4) = 4
-  face(2,4) = 8
-  face(3,4) = 5
-  face(4,4) = 1
-
-  face(1,5) = 1
-  face(2,5) = 5
-  face(3,5) = 6
-  face(4,5) = 2
-
-  face(1,6) = 5
-  face(2,6) = 8
-  face(3,6) = 7
-  face(4,6) = 6
-
-  face_order(1:num_face) = 4
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Old coordinates'
-  write ( *, '(a)' ) ' '
-  do j = 1, num_cor3
-    write ( *, '(i4, 3g14.6)' ) j, cor3(1:3,j)
-  end do
-
-  call node_relax ( cor3, cor3_new, cor3_num, face, face_order, max_cor3, &
-    max_face, max_order, num_cor3, num_face )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)') '  After 1 step'
-  write ( *, '(a)' ) ' '
-
-  do j = 1, num_cor3
-    write ( *, '(i4, 3g14.6)' ) j, cor3_new(1:3,j)
-  end do
-
-  cor3(1:3,1:num_cor3) = cor3_new(1:3,1:num_cor3)
-
-  call node_relax ( cor3, cor3_new, cor3_num, face, face_order, max_cor3, &
-    max_face, max_order, num_cor3, num_face )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  After 2 steps'
-  write ( *, '(a)' ) ' '
-
-  do j = 1, num_cor3
-    write ( *, '(i4, 3g14.6)' ) j, cor3_new(1:3,j)
-  end do
-
-  cor3(1:3,1:num_cor3) = cor3_new(1:3,1:num_cor3)
-
-  call node_relax ( cor3, cor3_new, cor3_num, face, face_order, max_cor3, &
-    max_face, max_order, num_cor3, num_face )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  After 3 steps'
-  write ( *, '(a)' ) ' '
-
-  do j = 1, num_cor3
-    write ( *, '(i4, 3g14.6)' ) j, cor3_new(1:3,j)
-  end do
-
-  return
-end
-subroutine test0665
-
-!*****************************************************************************80
-!
-!! TEST0665 tests PERM_INC.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: n = 4
-
-  integer i
-  integer ipos
-  integer perm(n)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0665'
-  write ( *, '(a)' ) '  PERM_INC increments a permutation.'
-  write ( *, '(a)' ) ' '
-
-  i = 0
-  ipos = 0
-
-  do
-
-    call perm_inc ( perm, ipos, n )
-
-    if ( ipos == 0 ) then
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i3,2x,4i2)' ) i, perm(1:n)
-
-  end do
-
-  return
-end
-subroutine test067
-
-!*****************************************************************************80
-!
-!! TEST067 tests POLY_TO_TRI.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: max_face = 20
-  integer, parameter :: max_vert = 5
-
-  integer face(max_vert,max_face)
-  integer i
-  integer ierror
-  integer j
-  integer num_face
-  integer num_vert(max_face)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST067'
-  write ( *, '(a)' ) '  POLY_TO_TRI replaces a polygonal mesh with a'
-  write ( *, '(a)' ) '    triangular one.'
-
-  num_face = 4
-
-  num_vert(1) = 4
-  face(1,1) = 1
-  face(2,1) = 3
-  face(3,1) = 5
-  face(4,1) = 7
-
-  num_vert(2) = 3
-  face(1,2) = 2
-  face(2,2) = 3
-  face(3,2) = 9
-
-  num_vert(3) = 5
-  face(1,3) = 3
-  face(2,3) = 7
-  face(3,3) = 8
-  face(4,3) = 23
-  face(5,3) = 2
-
-  num_vert(4) = 4
-  face(1,4) = 4
-  face(2,4) = 7
-  face(3,4) = 8
-  face(4,4) = 23
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of faces = ', num_face
-
-  call i4vec_print ( num_face, num_vert, '  Faces and number of vertices:' )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Face   Vertices'
-  write ( *, '(a)' ) ' '
-  do i = 1, num_face
-    write ( *, '(6i8)' ) i, ( face(j,i), j = 1, num_vert(i) )
-  end do
-
-  call poly_to_tri ( face, ierror, max_face, max_vert, num_face, num_vert )
-
-  if ( ierror /= 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  The algorithm failed.'
-  else
-    write ( *, '(a)' ) ' '
-    write ( *, '(a,i8)' ) '  Number of faces = ', num_face
-
-    call i4vec_print ( num_face, num_vert, '  Faces and number of vertices:' )
-
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  Face   Vertices'
-    write ( *, '(a)' ) ' '
-    do i = 1, num_face
-      write ( *, '(6i8)' ) i, ( face(j,i), j = 1, num_vert(i) )
-    end do
-
-  end if
-
-  return
-end
-subroutine test068
-
-!*****************************************************************************80
-!
-!! TEST068 tests PRUEFER_TO_TREE_ARC.
-!
-!  The tree is
-!
-!          5
-!          |
-!    2-3-6-8-1-9
-!      |   |
-!      7   4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-
-  integer, save, dimension ( nnode-2 ) :: code = (/ 1, 3, 8, 8, 3, 6, 8 /)
-  integer inode(nnode-1)
-  integer jnode(nnode-1)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST068'
-  write ( *, '(a)' ) '  PRUEFER_TO_TREE_ARC computes a tree from its Pruefer code.'
- 
-  call i4vec_print ( nnode-2, code, '  The Pruefer code:' )
-
-  call pruefer_to_tree_arc ( nnode, code, inode, jnode )
- 
-  call graph_arc_print ( nnode-1, inode, jnode, '  The graph:' )
-
-  return
-end
-subroutine test069
-
-!*****************************************************************************80
-!
-!! TEST069 tests PRUEFER_TO_TREE_2.
-!
-!  The tree is
-!
-!          5
-!          |
-!    2-3-6-8-1-9
-!      |   |
-!      7   4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-
-  integer, save, dimension ( nnode ) :: code = (/ 1, 3, 8, 8, 3, 6, 8, 0, 0 /)
-  integer itree(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST069'
-  write ( *, '(a)' ) '  PRUEFER_TO_TREE_2 produces a tree from its Pruefer code'
-
-  call i4vec_print ( nnode-2, code, '  The Pruefer code:' )
-
-  call pruefer_to_tree_2 ( nnode, code, itree )
- 
-  call i4vec_print ( nnode-1, itree, '  The edge list of the tree:' )
- 
-  return
-end
-subroutine test0695
-
-!*****************************************************************************80
-!
-!! TEST0695 tests VLA_TO_GRAPH_ARC, SHAPE_3D_NODES_TO_PS.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: max_edge = 1000
-  integer, parameter :: max_node = 1000
-
-  character ( len = 80 ) :: file_in = 'fish_lines.vla'
-  character ( len = 80 ) :: file_out = 'fish_nodes.ps'
-  integer ierror
-  integer inode(max_edge)
-  integer jnode(max_edge)
-  integer num_edge
-  integer num_node
-  real ( kind = 8 ) x(max_node)
-  real ( kind = 8 ) y(max_node)
-  real ( kind = 8 ) z(max_node)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0695'
-  write ( *, '(a)' ) '  VLA_TO_GRAPH_ARC reads a VLA file and converts it'
-  write ( *, '(a)' ) '    to a graph defined by an arc list.'
-  write ( *, '(a)' ) '  SHAPE_3D_NODES_TO_PS writes the nodes to a PostScript file.'
-!
-!  Get the edge array for the graph.
-!
-  call vla_to_graph_arc ( file_in, max_edge, max_node, num_edge, &
-    num_node, inode, jnode, x, y, z, ierror )
-
-  if ( ierror /= 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)') '  VLA_TO_GRAPH_ARC returned an error.'
-    return
-  end if
-
-  call shape_3d_nodes_to_ps ( file_out, num_node, x, y, z )
-
-  return
-end
-subroutine test0696
-
-!*****************************************************************************80
-!
-!! TEST0696 tests VLA_TO_GRAPH_ARC, SHAPE_3D_EDGES_TO_PS.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: max_edge = 1000
-  integer, parameter :: max_face = 2000
-  integer, parameter :: max_node = 1000
-  integer, parameter :: max_order = 20
-
-  integer face(max_order,max_face)
-  integer face_count(max_edge)
-  integer face_order(max_face)
-  character ( len = 80 ) :: file_in = 'fish_lines.vla'
-  character ( len = 80 ) :: file_out = 'fish_edges.ps'
-  integer ierror
-  integer iface(max_edge)
-  integer inode(max_edge)
-  integer jface(max_edge)
-  integer jnode(max_edge)
-  integer num_edge
-  integer num_face
-  integer num_node
-  real ( kind = 8 ) x(max_node)
-  real ( kind = 8 ) y(max_node)
-  real ( kind = 8 ) z(max_node)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0696'
-  write ( *, '(a)' ) '  VLA_TO_GRAPH_ARC reads a VLA file and converts it'
-  write ( *, '(a)' ) '    to a graph defined by an arc list.'
-  write ( *, '(a)' ) '  SHAPE_3D_EDGES_TO_PS writes the edges to a PostScript file.'
-!
-!  Get the edge array for the graph.
-!
-  call vla_to_graph_arc ( file_in, max_edge, max_node, num_edge, &
-    num_node, inode, jnode, x, y, z, ierror )
-
-  if ( ierror /= 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  VLA_TO_GRAPH_ARC returned an error.'
-    return
-  end if
-!
-!  Sort the edge array.
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Sort the edges:'
-
-  call graph_arc_edge_sort ( num_edge, inode, jnode )
-!
-!  Determine the faces.
-!
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Determine the faces:'
-
-  call graph_arc_face ( face, face_count, face_order, iface, jface, inode, &
-    jnode, max_face, max_order, num_edge, num_face, num_node )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  The faces were determined.'
-  write ( *, '(a,i8)' ) '    Number of faces found was ', num_face
-  write ( *, '(a,i8)' ) '    Euler predicted ', num_edge + 2 - num_node
-
-  call shape_3d_edges_to_ps ( file_out, max_order, num_face, num_node, &
-    face, face_order, x, y, z )
-
-  return
-end
-subroutine test0697
-
-!*****************************************************************************80
-!
-!! TEST0697 tests VLA_TO_GRAPH_ARC, SHAPE_3D_FACES_TO_PS.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: max_edge = 1000
-  integer, parameter :: max_face = 2000
-  integer, parameter :: max_node = 500
-  integer, parameter :: max_order = 20
-
-  integer face(max_order,max_face)
-  integer face_count(max_edge)
-  integer face_order(max_face)
-  character ( len = 80 ) :: file_in = 'fish_lines.vla'
-  character ( len = 80 ) :: file_out = 'fish_faces.ps'
-  integer ierror
-  integer iface(max_edge)
-  integer inode(max_edge)
-  integer jface(max_edge)
-  integer jnode(max_edge)
-  integer num_edge
-  integer num_face
-  integer num_node
-  real ( kind = 8 ) x(max_node)
-  real ( kind = 8 ) y(max_node)
-  real ( kind = 8 ) z(max_node)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST0697'
-  write ( *, '(a)' ) '  VLA_TO_GRAPH_ARC reads a VLA file and converts it'
-  write ( *, '(a)' ) '    to a graph defined by an arc list.'
-  write ( *, '(a)' ) '  SHAPE_3D_FACES_TO_PS writes the faces to a PostScript file.'
-!
-!  Get the edge array for the graph.
-!
-  call vla_to_graph_arc ( file_in, max_edge, max_node, num_edge, &
-    num_node, inode, jnode, x, y, z, ierror )
-
-  if ( ierror /= 0 ) then
-    write ( *, '(a)' ) 'TEST0697 - Error!'
-    write ( *, '(a)' ) '  VLA_TO_GRAPH_ARC returned an error.'
-    return
-  end if
-!
-!  Sort the edge array.
-
-  call graph_arc_edge_sort ( num_edge, inode, jnode )
-!
-!  Determine the faces.
-!
-  call graph_arc_face ( face, face_count, face_order, iface, jface, inode, &
-    jnode, max_face, max_order, num_edge, num_face, num_node )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of faces found was ', num_face
-  write ( *, '(a,i8)' ) '  Euler predicted ', num_edge + 2 - num_node
-
-  call shape_3d_faces_to_ps ( file_out, max_order, num_face, num_node, &
-    face, face_order, x, y, z )
-
-  return
-end
-subroutine test070
-
-!*****************************************************************************80
-!
-!! TEST070 tests SORT_HEAP_EXTERNAL.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: n = 20
-
-  integer a(n)
-  integer i
-  integer indx
-  integer isgn
-  integer j
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST070'
-  write ( *, '(a)' ) '  SORT_HEAP_EXTERNAL sorts objects externally.'
-  write ( *, '(a)' ) ' '
-
-  indx = 0
-  i = 0
-  j = 0
-  isgn = 0
-
-  call i4vec_uniform ( n, 1, n, seed, a )
-
-  call i4vec_print ( n, a, '  Before sorting:' ) 
- 
-  do
-
-    call sort_heap_external ( n, indx, i, j, isgn )
- 
-    if ( indx < 0 ) then
-      isgn = 1
-      if ( a(i) <= a(j) ) then
-        isgn = -1
-      end if
-    else if ( indx > 0 ) then
-      call i4_swap ( a(i), a(j) )
-    else
-      exit
-    end if
-
-  end do
-
-  call i4vec_print ( n, a, '  After sorting:' )
- 
-  return
-end
-subroutine test071
-
-!*****************************************************************************80
-!
-!! TEST071 tests SPAN_FOREST.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 14
-  integer, parameter :: nedge = 10
-
-  integer component(nnode)
-  integer i
-  integer iendpt(2,nedge)
-  integer j
-  integer k
-
-  data ( ( iendpt(i,j), i = 1, 2 ), j = 1, nedge ) / &
-    2,3, 4,7, 1,9, 7,11, 5,8, 2,5, 6,10, 2,8, 3,8, 4,11 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST071'
-  write ( *, '(a)' ) '  SPAN_FOREST: a spanning forest for a graph'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Initial end point array:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(19i4)' ) ( iendpt(1,j), j = 1, nedge )
-  write ( *, '(19i4)' ) ( iendpt(2,j), j = 1, nedge )
- 
-  call span_forest ( nnode, nedge, iendpt, k, component )
- 
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Reordered endpoint array:'
-  write ( *, '(a)' ) ' '
-  write ( *, '(19i4)' ) ( iendpt(1,j), j = 1, nedge )
-  write ( *, '(19i4)' ) ( iendpt(2,j), j = 1, nedge )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of connected components = ', k
- 
-  call i4vec_print ( nnode, component, '  Node, Component' )
-
-  return
-end
-subroutine test072
-
-!*****************************************************************************80
-!
-!! TEST072 tests SPAN_TREE_NEXT;
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-  integer, parameter :: nedge = 10
-
-  integer i
-  integer iarray(nnode-1)
-  integer iendpt(2,nedge)
-  integer j
-  integer ncan(nnode-1)
-  integer nspan
-  integer signal
-
-  data ( ( iendpt(i,j), i = 1, 2 ), j = 1, nedge ) / &
-    1,2, 1,3, 1,4, 1,5, 2,3, 2,4, 2,5, 3,4, 3,5, 4,5 /
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST072'
-  write ( *, '(a)' ) '  SPAN_TREE_NEXT constructs spanning trees'
-  write ( *, '(a)' ) '    of a graph using a backtrack search.'
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '   Node1   Node2'
-  write ( *, '(a)' ) ' '
-  do i = 1, nedge
-    write ( *, '(3i8)' ) iendpt(1,i), iendpt(2,i)
-  end do
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Edges in spanning tree:'
-  write ( *, '(a)' ) ' '
-
-  nspan = 0
-  signal = 0
-
-  do
-
-    call span_tree_next ( signal, nnode, nedge, iendpt, iarray, ncan )
-
-    if ( signal == 0 ) then 
-      exit
-    end if
-
-    nspan = nspan + 1
-    write ( *, '(i4,4x,5i4)' ) nspan, iarray(1:nnode-1)
-
-  end do
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of spanning trees found was ', nspan
-
-  return
-end
-subroutine test073
-
-!*****************************************************************************80
-!
-!! TEST073 tests TREE_ARC_TO_PRUEFER.
-!
-!  The tree is
-!
-!          5
-!          |
-!    2-3-6-8-1-9
-!      |   |
-!      7   4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-
-  integer iarray(nnode-2)
-  integer, dimension ( nnode - 1 ) :: inode = (/ 2, 3, 3, 6, 8, 8, 8, 1 /)
-  integer, dimension ( nnode - 1 ) :: jnode = (/ 3, 7, 6, 8, 4, 5, 1, 9 /)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST073'
-  write ( *, '(a)' ) '  TREE_ARC_TO_PRUEFER: Tree => Pruefer code'
-
-  call graph_arc_print ( nnode-1, inode, jnode, '  The graph:' )
- 
-  call tree_arc_to_pruefer ( nnode, inode, jnode, iarray )
-
-  call i4vec_print ( nnode-2, iarray, '  The Pruefer code:' )
- 
-  return
-end
-subroutine test074
-
-!*****************************************************************************
-!
-!! TEST074 tests TREE_ARC_CENTER.
-!
-!  2---3---6---8---1---9
-!     /       / \
-!    7       5   4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 9
-
-  integer center(2)
-  integer eccent
-  integer i
-  integer, dimension ( nnode - 1 ) :: inode = (/ 2, 3, 3, 6, 8, 8, 8, 1 /)
-  integer, dimension ( nnode - 1 ) :: jnode = (/ 3, 7, 6, 8, 4, 5, 1, 9 /)
-  integer parity
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST074'
-  write ( *, '(a)' ) '  TREE_ARC_CENTER computes the center of a tree.'
-
-  call graph_arc_print ( nnode-1, inode, jnode, '  The edge list of the tree:' )
-
-  call tree_arc_center ( nnode, inode, jnode, center, eccent, parity )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Parity = ', parity
-  write ( *, '(a,i8)' ) '  Eccentricity is ', eccent
-
-  if ( parity == 0 ) then
-    write ( *, '(a)' ) '  No center node (degenerate case).'
-  else if ( parity == 1 ) then
-    write ( *, '(a,i8)' ) '  Center node: ', center(1)
-  else
-    write ( *, '(a,2i8)' ) '  Center nodes: ', center(1), center(2)
-  end if
-
-  return
-end
-subroutine test075
-
-!*****************************************************************************
-!
-!! TEST075 tests TREE_ARC_DIAM.
-!
-!  2---3---6---8---1---9
-!     /       / \
-!    7       5   4
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  integer, parameter :: nnode = 9
-
-  integer diam
-  integer, dimension ( nnode-1 ) :: inode = (/ 2, 3, 3, 6, 8, 8, 8, 1 /)
-  integer, dimension ( nnode-1 ) :: jnode = (/ 3, 7, 6, 8, 4, 5, 1, 9 /)
-  integer label(nnode)
-  integer nnode1
-  integer nnode2
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST075'
-  write ( *, '(a)' ) '  TREE_ARC_DIAM computes the diameter of a tree.'
-
-  call graph_arc_print ( nnode-1, inode, jnode, '  The edge list of the tree:' )
-
-  call tree_arc_diam ( nnode, inode, jnode, diam, label, nnode1, nnode2 )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  This tree has a diameter of ', diam
-  write ( *, '(a,i8,a,i8)' ) '  between nodes ', nnode1, ' and ', nnode2
-
-  call i4vec_print ( nnode, label, '  Nodes and labels:' )
-
-  return
-end
-subroutine test076
-
-!*****************************************************************************80
-!
-!! TEST076 tests TREE_ARC_RANDOM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 4
-
-  integer i
-  integer icode(nnode-2)
-  integer inode(nnode-1)
-  integer jnode(nnode-1)
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST076'
-  write ( *, '(a)' ) '  TREE_ARC_RANDOM produces a random labeled'
-  write ( *, '(a)' ) '    tree and its Pruefer code.'
-  write ( *, '(a)' ) ' '
- 
-  do i = 1, 5
-
-    call tree_arc_random ( nnode, seed, icode, inode, jnode )
-
-    call graph_arc_print ( nnode-1, inode, jnode, '  The random tree:' )
-
-    call i4vec_print ( nnode-2, icode, '  The Pruefer code:' )
-
-  end do
- 
-  return
-end
-subroutine test077
-
-!*****************************************************************************80
-!
-!! TEST077 tests TREE_ENUM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer nnode
-  integer num
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST077'
-  write ( *, '(a)' ) '  TREE_ENUM enumerates the labeled trees on a given'
-  write ( *, '(a)' ) '  number of nodes.'
-  write ( *, '(a)' ) ' '
-
-  do nnode = 0, 10
-
-    call tree_enum ( nnode, num )
-
-    write ( *, '(i8,i10)' ) nnode, num
-
-  end do
- 
-  return
-end
-subroutine test078
-
-!*****************************************************************************80
-!
-!! TEST078 tests TREE_PARENT_NEXT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 4
-
-  integer iarray(nnode)
-  integer icode(nnode)
-  integer itree(nnode)
-  logical more
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST078'
-  write ( *, '(a)' ) '  TREE_PARENT_NEXT finds all labeled trees of a given '
-  write ( *, '(a)' ) '    order, and their Pruefer codes.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Pruefer code     Tree'
-  write ( *, '(a)' ) ' '
- 
-  more = .false.
- 
-  do
- 
-    call tree_parent_next ( nnode, iarray, icode, itree, more )
- 
-    write ( *, '(2i2,14x,3i2)' ) icode(1:nnode-2), itree(1:nnode-1)
-
-    if ( .not. more ) then
-      exit
-    end if
-
-  end do
- 
-  return
-end
-subroutine test079
-
-!*****************************************************************************80
-!
-!! TEST079 tests TREE_RB_ENUM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer nnode
-  integer num
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST079'
-  write ( *, '(a)' ) '  TREE_RB_ENUM enumerates the rooted binary trees on a '
-  write ( *, '(a)' ) '    given number of nodes.'
-  write ( *, '(a)' ) ' '
-
-  do nnode = 0, 11
-
-    call tree_rb_enum ( nnode, num )
-
-    write ( *, '(2x,i8,2x,i8)' ) nnode, num
-
-  end do
- 
-  return
-end
-subroutine test080
-
-!*****************************************************************************80
-!
-!! TEST080 tests TREE_RB_LEX_NEXT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: n = 11
-
-  integer a(n)
-  integer i
-  logical more
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST080'
-  write ( *, '(a)' ) '  TREE_RB_LEX_NEXT produces all rooted binary trees with'
-  write ( *, '(a)' ) '  a given number of nodes, in lexicographic order, using'
-  write ( *, '(a)' ) '  the preorder traversal representation.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  The number of nodes N = ', n
-  write ( *, '(a)' ) ' '
-
-  more = .false.
-  i = 0
-
-  do
-
-    call tree_rb_lex_next ( n, a, more )
-
-    if ( .not. more ) then 
-      exit
-    end if
-
-    i = i + 1
-    write ( *, '(i2,2x,11i1)' ) i, a(1:11)
-
-  end do
-
-  return
-end
-subroutine test081
-
-!*****************************************************************************80
-!
-!! TEST081 tests TREE_RB_LEX_NEXT, TREE_RB_TO_PARENT.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: n = 11
-
-  integer a(n)
-  integer i
-  logical more
-  integer parent(n)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST081'
-  write ( *, '(a)' ) '  TREE_RB_LEX_NEXT produces all rooted binary trees with'
-  write ( *, '(a)' ) '    a given number of nodes, in lexicographic order,'
-  write ( *, '(a)' ) '    using the preorder traversal representation.'
-  write ( *, '(a)' ) '  TREE_RB_TO_PARENT converts the preorder traversal form'
-  write ( *, '(a)' ) '    to the more comprehensible parent node representation.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  The number of nodes N = ', n
-  write ( *, '(a)' ) ' '
-
-  more = .false.
-  i = 0
-
-  do
-
-    call tree_rb_lex_next ( n, a, more )
-
-    if ( .not. more ) then 
-      exit
-    end if
-
-    call tree_rb_to_parent ( n, a, parent )
-
-    i = i + 1
-    write ( *, '(i2,2x,11i3)' ) i, parent(1:n)
-
-  end do
-
-  return
-end
-subroutine test082
-
-!*****************************************************************************80
-!
-!! TEST082 tests TREE_RB_YULE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: n_max = 11
-
-  integer a(n_max)
-  integer i
-  integer n
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST082'
-  write ( *, '(a)' ) '  TREE_RB_YULE carries out one step of the Yule model'
-  write ( *, '(a)' ) '    on a rooted binary tree stored in preorder traversal form.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Each call adds two children to an arbitary leaf.'
-
-  do i = 1, 5
-
-    write ( *, '(a)' ) ' '
-    write ( *, '(a,i8)' ) '  Simulation ', i
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  Nodes  Preorder code'
-    write ( *, '(a)' ) ' '
-
-    n = 0
-
-    do
-
-      call tree_rb_yule ( n, seed, a )
-
-      write ( *, '(i2,2x,11i1)' ) n, a(1:n)
-
-      if ( n + 2 > n_max ) then
-        exit
-      end if
-
-    end do
-
-  end do
-
-  return
-end
-subroutine test083
-
-!*****************************************************************************80
-!
-!! TEST083 tests TREE_ROOTED_CODE.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 12
-
-  integer code(2*nnode)
-  integer, dimension ( nnode ) :: parent = &
-    (/ 0, 1, 1, 2, 2, 2, 3, 3, 5, 5, 6, 10 /) 
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST083'
-  write ( *, '(a)' ) '  TREE_ROOTED_CODE: code of a rooted tree.'
-  write ( *, '(a)' ) ' '
-
-  call i4vec_print ( nnode, parent, '  Parent vector for tree:' )
-
-  call tree_rooted_code ( nnode, parent, code )
-
-  call i4vec_print ( 2*nnode, code, '  The tree code:' )
-
-  return
-end
-subroutine test084
-
-!*****************************************************************************80
-!
-!! TEST084 tests TREE_ROOTED_DEPTH.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 12
-
-  integer depth
-  integer depth_node(nnode)
-  integer, dimension ( nnode ) :: parent = &
-    (/ 0, 1, 1, 2, 2, 2, 3, 3, 5, 5, 6, 10 /) 
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST084'
-  write ( *, '(a)' ) '  TREE_ROOTED_DEPTH: depth of a rooted tree.'
-  write ( *, '(a)' ) ' '
-
-  call i4vec_print ( nnode, parent, '  Parent vector for tree:' )
-
-  call tree_rooted_depth ( nnode, parent, depth, depth_node )
-
-  call i4vec_print ( nnode, depth_node, '  Individual node depths:' )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Overall rooted tree depth: ', depth
-
-  return
-end
-subroutine test085
-
-!*****************************************************************************80
-!
-!! TEST085 tests TREE_ROOTED_RANDOM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 5
-
-  integer i
-  integer itree(nnode)
-  integer j
-  integer ntree(nnode)
-  integer seed
-
-  seed = 123456789
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST085'
-  write ( *, '(a)' ) '  TREE_ROOTED_RANDOM: random unlabeled rooted trees.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Random trees, rooted at 1'
- 
-  do i = 1, 5
-
-    call tree_rooted_random ( nnode, seed, ntree, itree )
-
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  Endpoint array for tree:'
-    write ( *, '(19i4)' ) ( j, j = 2, nnode )
-    write ( *, '(19i4)' ) itree(2:nnode)
-
-  end do
- 
-  call i4vec_print ( nnode, ntree, &
-    '  Number of trees with given number of nodes:' )
- 
-  return
-end
-subroutine test086
-
-!*****************************************************************************80
-!
-!! TEST086 tests TREE_ROOTED_ENUM.
-!
-!  Licensing:
-!
-!    This code is distributed under the GNU LGPL license. 
-!
-!  Modified:
-!
-!    20 January 2009
-!
-!  Author:
-!
-!    John Burkardt
-!
-  implicit none
-
-  integer, parameter :: nnode = 10
-
-  integer ntree(nnode)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST086'
-  write ( *, '(a)' ) '  TREE_ROOTED_ENUM counts unlabeled rooted trees.'
-
-  call tree_rooted_enum ( nnode, ntree )
-
-  call i4vec_print ( nnode, ntree, &
-    '  Number of trees with given number of nodes:' )
-
-  return
-end
diff --git a/sandbox/stripack/stripack.csh b/sandbox/stripack/stripack.csh
deleted file mode 100644
index 4e9c438..0000000
--- a/sandbox/stripack/stripack.csh
+++ /dev/null
@@ -1,28 +0,0 @@
-#!/bin/csh
-#
-mkdir temp
-cd temp
-rm *
-f90split ../stripack.f90
-#
-foreach FILE (`ls -1 *.f90`)
-  F90 -c -g $FILE >& compiler.txt
-  if ( $status != 0 ) then
-   echo "Errors while compiling " $FILE
-    exit
-  endif
-  rm compiler.txt
-end
-rm *.f90
-#
-ar qc libstripack.a *.o
-rm *.o
-#
-mv libstripack.a ~/lib/$ARCH
-if ( $status != 0 ) then
-  exit
-endif
-cd ..
-rmdir temp
-#
-echo "Library installed as ~/lib/$ARCH/libstripack.a"
diff --git a/sandbox/stripack/stripack.f90 b/sandbox/stripack/stripack.f90
deleted file mode 100644
index f15401f..0000000
--- a/sandbox/stripack/stripack.f90
+++ /dev/null
@@ -1,8459 +0,0 @@
-subroutine addnod ( nst, k, x, y, z, list, lptr, lend, lnew, ier )
-
-!*****************************************************************************80
-!
-!! ADDNOD adds a node to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine adds node K to a triangulation of the
-!    convex hull of nodes 1, ..., K-1, producing a triangulation
-!    of the convex hull of nodes 1, ..., K.
-!
-!    The algorithm consists of the following steps:  node K
-!    is located relative to the triangulation (TRFIND), its
-!    index is added to the data structure (INTADD or BDYADD),
-!    and a sequence of swaps (SWPTST and SWAP) are applied to
-!    the arcs opposite K so that all arcs incident on node K
-!    and opposite node K are locally optimal (satisfy the circumcircle test).  
-!
-!    Thus, if a Delaunay triangulation of nodes 1 through K-1 is input, 
-!    a Delaunay triangulation of nodes 1 through K will be output.
-!
-!  Modified:
-!
-!    15 May 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) NST, the index of a node at which TRFIND 
-!    begins its search.  Search time depends on the proximity of this node to 
-!    K.  If NST < 1, the search is begun at node K-1.
-!
-!    Input, integer ( kind = 4 ) K, the nodal index (index for X, Y, Z, and 
-!    LEND) of the new node to be added.  4 <= K.
-!
-!    Input, real ( kind = 8 ) X(K), Y(K), Z(K), the coordinates of the nodes.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(K), 
-!    LNEW.  On input, the data structure associated with the triangulation of 
-!    nodes 1 to K-1.  On output, the data has been updated to include node 
-!    K.  The array lengths are assumed to be large enough to add node K. 
-!    Refer to TRMESH.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!     0 if no errors were encountered.
-!    -1 if K is outside its valid range on input.
-!    -2 if all nodes (including K) are collinear (lie on a common geodesic).
-!     L if nodes L and K coincide for some L < K.
-!
-!  Local parameters:
-!
-!    B1,B2,B3 = Unnormalized barycentric coordinates returned by TRFIND.
-!    I1,I2,I3 = Vertex indexes of a triangle containing K
-!    IN1 =      Vertex opposite K:  first neighbor of IO2
-!               that precedes IO1.  IN1,IO1,IO2 are in
-!               counterclockwise order.
-!    IO1,IO2 =  Adjacent neighbors of K defining an arc to
-!               be tested for a swap
-!    IST =      Index of node at which TRFIND begins its search
-!    KK =       Local copy of K
-!    KM1 =      K-1
-!    L =        Vertex index (I1, I2, or I3) returned in IER
-!               if node K coincides with a vertex
-!    LP =       LIST pointer
-!    LPF =      LIST pointer to the first neighbor of K
-!    LPO1 =     LIST pointer to IO1
-!    LPO1S =    Saved value of LPO1
-!    P =        Cartesian coordinates of node K
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-
-  real    ( kind = 8 ) b1
-  real    ( kind = 8 ) b2
-  real    ( kind = 8 ) b3
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) in1
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) ist
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) km1
-  integer ( kind = 4 ) l
-  integer ( kind = 4 ) lend(k)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpf
-  integer ( kind = 4 ) lpo1
-  integer ( kind = 4 ) lpo1s
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) nst
-  real    ( kind = 8 ) p(3)
-  logical              swptst
-  real    ( kind = 8 ) x(k)
-  real    ( kind = 8 ) y(k)
-  real    ( kind = 8 ) z(k)
-
-  kk = k
-
-  if ( kk < 4 ) then
-    ier = -1
-    return
-  end if
-!
-!  Initialization:
-!
-  km1 = kk - 1
-  ist = nst
-  if ( ist < 1 ) then
-    ist = km1
-  end if
-
-  p(1) = x(kk)
-  p(2) = y(kk)
-  p(3) = z(kk)
-!
-!  Find a triangle (I1,I2,I3) containing K or the rightmost
-!  (I1) and leftmost (I2) visible boundary nodes as viewed
-!  from node K.
-!
-  call trfind ( ist, p, km1, x, y, z, list, lptr, lend, b1, b2, b3, &
-    i1, i2, i3 )
-!
-!  Test for collinear or duplicate nodes.
-!
-  if ( i1 == 0 ) then
-    ier = -2
-    return
-  end if
- 
-  if ( i3 /= 0 ) then
-
-    l = i1
-
-    if ( p(1) == x(l) .and. p(2) == y(l)  .and. p(3) == z(l) ) then
-      ier = l
-      return
-    end if
-
-    l = i2
-
-    if ( p(1) == x(l) .and. p(2) == y(l)  .and. p(3) == z(l) ) then
-      ier = l
-      return
-    end if
-
-    l = i3
-    if ( p(1) == x(l) .and. p(2) == y(l)  .and. p(3) == z(l) ) then
-      ier = l
-      return
-    end if
-
-    call intadd ( kk, i1, i2, i3, list, lptr, lend, lnew )
-
-  else
-
-    if ( i1 /= i2 ) then
-      call bdyadd ( kk, i1,i2, list, lptr, lend, lnew )
-    else
-      call covsph ( kk, i1, list, lptr, lend, lnew )
-    end if
-
-  end if
-
-  ier = 0
-!
-!  Initialize variables for optimization of the triangulation.
-!
-  lp = lend(kk)
-  lpf = lptr(lp)
-  io2 = list(lpf)
-  lpo1 = lptr(lpf)
-  io1 = abs ( list(lpo1) )
-!
-!  Begin loop: find the node opposite K.
-!
-  do
-
-    lp = lstptr ( lend(io1), io2, list, lptr )
-
-    if ( 0 <= list(lp) ) then
-
-      lp = lptr(lp)
-      in1 = abs ( list(lp) )
-!
-!  Swap test:  if a swap occurs, two new arcs are
-!  opposite K and must be tested.
-!
-      lpo1s = lpo1
-
-      if ( .not. swptst ( in1, kk, io1, io2, x, y, z ) ) then
-
-        if ( lpo1 == lpf .or. list(lpo1) < 0 ) then
-          exit
-        end if
-
-        io2 = io1
-        lpo1 = lptr(lpo1)
-        io1 = abs ( list(lpo1) )
-        cycle
-
-      end if
-
-      call swap ( in1, kk, io1, io2, list, lptr, lend, lpo1 )
-!
-!  A swap is not possible because KK and IN1 are already
-!  adjacent.  This error in SWPTST only occurs in the
-!  neutral case and when there are nearly duplicate nodes.
-!
-      if ( lpo1 /= 0 ) then
-        io1 = in1
-        cycle
-      end if
-
-      lpo1 = lpo1s
-
-    end if
-!
-!  No swap occurred.  Test for termination and reset IO2 and IO1.
-!
-    if ( lpo1 == lpf .or. list(lpo1) < 0 ) then
-      exit
-    end if
-
-    io2 = io1
-    lpo1 = lptr(lpo1)
-    io1 = abs ( list(lpo1) )
-
-  end do
-
-  return
-end
-function arc_cosine ( c )
-
-!*****************************************************************************80
-!
-!! ARC_COSINE computes the arc cosine function, with argument truncation.
-!
-!  Discussion:
-!
-!    If you call your system ACOS routine with an input argument that is
-!    outside the range [-1.0, 1.0 ], you may get an unpleasant surprise.
-!    This routine truncates arguments outside the range.
-!
-!  Modified:
-!
-!    02 December 2000
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) C, the argument.
-!
-!    Output, real ( kind = 8 ) ARC_COSINE, an angle whose cosine is C.
-!
-  implicit none
-
-  real    ( kind = 8 ) arc_cosine
-  real    ( kind = 8 ) c
-  real    ( kind = 8 ) c2
-
-  c2 = c
-  c2 = max ( c2, -1.0D+00 )
-  c2 = min ( c2, +1.0D+00 )
-
-  arc_cosine = acos ( c2 )
-
-  return
-end
-function areas ( v1, v2, v3 )
-
-!*****************************************************************************80
-!
-!! AREAS computes the area of a spherical triangle on the unit sphere.
-!
-!  Discussion:
-!
-!    This function returns the area of a spherical triangle
-!    on the unit sphere.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) V1(3), V2(3), V3(3), the Cartesian coordinates
-!    of unit vectors (the three triangle vertices in any order).  These 
-!    vectors, if nonzero, are implicitly scaled to have length 1.
-!
-!    Output, real ( kind = 8 ) AREAS, the area of the spherical triangle 
-!    defined by V1, V2, and V3, in the range 0 to 2*PI (the area of a
-!    hemisphere).  AREAS = 0 (or 2*PI) if and only if V1, V2, and V3 lie in (or
-!    close to) a plane containing the origin.
-!
-!  Local parameters:
-!
-!    A1,A2,A3 =    Interior angles of the spherical triangle.
-!
-!    CA1,CA2,CA3 = cos(A1), cos(A2), and cos(A3), respectively.
-!
-!    DV1,DV2,DV3 = Double Precision copies of V1, V2, and V3.
-!
-!    I =           DO-loop index and index for Uij.
-!
-!    S12,S23,S31 = Sum of squared components of U12, U23, U31.
-!
-!    U12,U23,U31 = Unit normal vectors to the planes defined by
-!                 pairs of triangle vertices.
-!
-  implicit none
-
-  real    ( kind = 8 ) a1
-  real    ( kind = 8 ) a2
-  real    ( kind = 8 ) a3
-  real    ( kind = 8 ) areas
-  real    ( kind = 8 ) ca1
-  real    ( kind = 8 ) ca2
-  real    ( kind = 8 ) ca3
-  real    ( kind = 8 ) dv1(3)
-  real    ( kind = 8 ) dv2(3)
-  real    ( kind = 8 ) dv3(3)
-  real    ( kind = 8 ) s12
-  real    ( kind = 8 ) s23
-  real    ( kind = 8 ) s31
-  real    ( kind = 8 ) u12(3)
-  real    ( kind = 8 ) u23(3)
-  real    ( kind = 8 ) u31(3)
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) v3(3)
-
-  dv1(1:3) = v1(1:3)
-  dv2(1:3) = v2(1:3)
-  dv3(1:3) = v3(1:3)
-!
-!  Compute cross products Uij = Vi X Vj.
-!
-  u12(1) = dv1(2) * dv2(3) - dv1(3) * dv2(2)
-  u12(2) = dv1(3) * dv2(1) - dv1(1) * dv2(3)
-  u12(3) = dv1(1) * dv2(2) - dv1(2) * dv2(1)
-
-  u23(1) = dv2(2) * dv3(3) - dv2(3) * dv3(2)
-  u23(2) = dv2(3) * dv3(1) - dv2(1) * dv3(3)
-  u23(3) = dv2(1) * dv3(2) - dv2(2) * dv3(1)
-
-  u31(1) = dv3(2) * dv1(3) - dv3(3) * dv1(2)
-  u31(2) = dv3(3) * dv1(1) - dv3(1) * dv1(3)
-  u31(3) = dv3(1) * dv1(2) - dv3(2) * dv1(1)
-!
-!  Normalize Uij to unit vectors.
-!
-  s12 = dot_product ( u12(1:3), u12(1:3) )
-  s23 = dot_product ( u23(1:3), u23(1:3) )
-  s31 = dot_product ( u31(1:3), u31(1:3) )
-!
-!  Test for a degenerate triangle associated with collinear vertices.
-!
-  if ( s12 == 0.0D+00 .or. s23 == 0.0D+00 .or. s31 == 0.0D+00 ) then
-    areas = 0.0D+00
-    return
-  end if
-
-  s12 = sqrt ( s12 )
-  s23 = sqrt ( s23 )
-  s31 = sqrt ( s31 )
-
-  u12(1:3) = u12(1:3) / s12
-  u23(1:3) = u23(1:3) / s23
-  u31(1:3) = u31(1:3) / s31
-!
-!  Compute interior angles Ai as the dihedral angles between planes:
-!  CA1 = cos(A1) = -<U12,U31>
-!  CA2 = cos(A2) = -<U23,U12>
-!  CA3 = cos(A3) = -<U31,U23>
-!
-  ca1 = - dot_product ( u12(1:3), u31(1:3) )
-  ca2 = - dot_product ( u23(1:3), u12(1:3) )
-  ca3 = - dot_product ( u31(1:3), u23(1:3) )
-
-  ca1 = max ( ca1, -1.0D+00 )
-  ca1 = min ( ca1, +1.0D+00 )
-  ca2 = max ( ca2, -1.0D+00 )
-  ca2 = min ( ca2, +1.0D+00 )
-  ca3 = max ( ca3, -1.0D+00 )
-  ca3 = min ( ca3, +1.0D+00 )
-
-  a1 = acos ( ca1 )
-  a2 = acos ( ca2 )
-  a3 = acos ( ca3 )
-!
-!  Compute AREAS = A1 + A2 + A3 - PI.
-!
-  areas = a1 + a2 + a3 - acos ( -1.0D+00 )
-
-  if ( areas < 0.0D+00 ) then
-    areas = 0.0D+00
-  end if
-
-  return
-end
-subroutine bdyadd ( kk, i1, i2, list, lptr, lend, lnew )
-
-!*****************************************************************************80
-!
-!! BDYADD adds a boundary node to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine adds a boundary node to a triangulation
-!    of a set of KK-1 points on the unit sphere.  The data
-!    structure is updated with the insertion of node KK, but no
-!    optimization is performed.
-!
-!    This routine is identical to the similarly named routine
-!    in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) KK, the index of a node to be connected to 
-!    the sequence of all visible boundary nodes.  1 <= KK and
-!    KK must not be equal to I1 or I2.
-!
-!    Input, integer ( kind = 4 ) I1, the first (rightmost as viewed from KK) 
-!    boundary node in the triangulation that is visible from
-!    node KK (the line segment KK-I1 intersects no arcs.
-!
-!    Input, integer ( kind = 4 ) I2, the last (leftmost) boundary node that 
-!    is visible from node KK.  I1 and I2 may be determined by TRFIND.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the triangulation data structure created by TRMESH.  
-!    Nodes I1 and I2 must be included 
-!    in the triangulation.  On output, the data structure is updated with
-!    the addition of node KK.  Node KK is connected to I1, I2, and
-!    all boundary nodes in between.
-!
-!  Local parameters:
-!
-!    K =     Local copy of KK
-!    LP =    LIST pointer
-!    LSAV =  LIST pointer
-!    N1,N2 = Local copies of I1 and I2, respectively
-!    NEXT =  Boundary node visible from K
-!    NSAV =  Boundary node visible from K
-!
-  implicit none
-
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lsav
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nsav
-
-  k = kk
-  n1 = i1
-  n2 = i2
-!
-!  Add K as the last neighbor of N1.
-!
-  lp = lend(n1)
-  lsav = lptr(lp)
-  lptr(lp) = lnew
-  list(lnew) = -k
-  lptr(lnew) = lsav
-  lend(n1) = lnew
-  lnew = lnew + 1
-  next = -list(lp)
-  list(lp) = next
-  nsav = next
-!
-!  Loop on the remaining boundary nodes between N1 and N2,
-!  adding K as the first neighbor.
-!
-  do
-
-    lp = lend(next)
-    call insert ( k, lp, list, lptr, lnew )
-
-    if ( next == n2 ) then
-      exit
-    end if
-
-    next = -list(lp)
-    list(lp) = next
-
-  end do
-!
-!  Add the boundary nodes between N1 and N2 as neighbors of node K.
-!
-  lsav = lnew
-  list(lnew) = n1
-  lptr(lnew) = lnew + 1
-  lnew = lnew + 1
-  next = nsav
-
-  do
-
-    if ( next == n2 ) then
-      exit
-    end if
-
-    list(lnew) = next
-    lptr(lnew) = lnew + 1
-    lnew = lnew + 1
-    lp = lend(next)
-    next = list(lp)
-
-  end do
-
-  list(lnew) = -n2
-  lptr(lnew) = lsav
-  lend(k) = lnew
-  lnew = lnew + 1
-
-  return
-end
-subroutine bnodes ( n, list, lptr, lend, nodes, nb, na, nt )
-
-!*****************************************************************************80
-!
-!! BNODES returns the boundary nodes of a triangulation.
-!
-!  Discussion:
-!
-!    Given a triangulation of N nodes on the unit sphere created by TRMESH, 
-!    this subroutine returns an array containing the indexes (if any) of 
-!    the counterclockwise sequence of boundary nodes, that is, the nodes on
-!    the boundary of the convex hull of the set of nodes.  The
-!    boundary is empty if the nodes do not lie in a single
-!    hemisphere.  The numbers of boundary nodes, arcs, and
-!    triangles are also returned.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the 
-!    data structure defining the triangulation, created by TRMESH.
-!
-!    Output, integer ( kind = 4 ) NODES(*), the ordered sequence of NB boundary
-!    node indexes in the range 1 to N.  For safety, the dimension of NODES
-!    should be N.
-!
-!    Output, integer ( kind = 4 ) NB, the number of boundary nodes.
-!
-!    Output, integer ( kind = 4 ) NA, NT, the number of arcs and triangles, 
-!    respectively, in the triangulation.
-!
-!  Local parameters:
-!
-!    K =   NODES index
-!    LP =  LIST pointer
-!    N0 =  Boundary node to be added to NODES
-!    NN =  Local copy of N
-!    NST = First element of nodes (arbitrarily chosen to be
-!          the one with smallest index)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) na
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nodes(*)
-  integer ( kind = 4 ) nst
-  integer ( kind = 4 ) nt
-
-  nn = n
-!
-!  Search for a boundary node.
-!
-  nst = 0
-
-  do i = 1, nn
-
-    lp = lend(i)
-
-    if ( list(lp) < 0 ) then
-      nst = i
-      exit
-    end if
-
-  end do
-!
-!  The triangulation contains no boundary nodes.
-!
-  if ( nst == 0 ) then
-    nb = 0
-    na = 3 * ( nn - 2 )
-    nt = 2 * ( nn - 2 )
-    return
-  end if
-!
-!  NST is the first boundary node encountered.
-!
-!  Initialize for traversal of the boundary.
-!
-  nodes(1) = nst
-  k = 1
-  n0 = nst
-!
-!  Traverse the boundary in counterclockwise order.
-!
-  do
-
-    lp = lend(n0)
-    lp = lptr(lp)
-    n0 = list(lp)
-
-    if ( n0 == nst ) then
-      exit
-    end if
-
-    k = k + 1
-    nodes(k) = n0
-
-  end do
-!
-!  Store the counts.
-!
-  nb = k
-  nt = 2 * n - nb - 2
-  na = nt + n - 1
-
-  return
-end
-subroutine circum ( v1, v2, v3, c, ier )
-
-!*****************************************************************************80
-!
-!! CIRCUM returns the circumcenter of a spherical triangle.
-!
-!  Discussion:
-!
-!    This subroutine returns the circumcenter of a spherical triangle on the 
-!    unit sphere:  the point on the sphere surface that is equally distant 
-!    from the three triangle vertices and lies in the same hemisphere, where 
-!    distance is taken to be arc-length on the sphere surface.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) V1(3), V2(3), V3(3), the coordinates of the 
-!    three triangle vertices (unit vectors) in counter clockwise order.
-!
-!    Output, real ( kind = 8 ) C(3), the coordinates of the circumcenter unless
-!    0 < IER, in which case C is not defined.  C = (V2-V1) X (V3-V1) 
-!    normalized to a unit vector.
-!
-!    Output, integer ( kind = 4 ) IER = Error indicator:
-!    0, if no errors were encountered.
-!    1, if V1, V2, and V3 lie on a common line:  (V2-V1) X (V3-V1) = 0.
-!
-!  Local parameters:
-!
-!    CNORM = Norm of CU:  used to compute C
-!    CU =    Scalar multiple of C:  E1 X E2
-!    E1,E2 = Edges of the underlying planar triangle:
-!            V2-V1 and V3-V1, respectively
-!    I =     DO-loop index
-!
-  implicit none
-
-  real    ( kind = 8 ) c(3)
-  real    ( kind = 8 ) cnorm
-  real    ( kind = 8 ) cu(3)
-  real    ( kind = 8 ) e1(3)
-  real    ( kind = 8 ) e2(3)
-  integer ( kind = 4 ) ier
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) v3(3)
-
-  ier = 0
-
-  e1(1:3) = v2(1:3) - v1(1:3)
-  e2(1:3) = v3(1:3) - v1(1:3)
-!
-!  Compute CU = E1 X E2 and CNORM**2.
-!
-  cu(1) = e1(2) * e2(3) - e1(3) * e2(2)
-  cu(2) = e1(3) * e2(1) - e1(1) * e2(3)
-  cu(3) = e1(1) * e2(2) - e1(2) * e2(1)
-
-  cnorm = sqrt ( sum ( cu(1:3)**2 ) )
-!
-!  The vertices lie on a common line if and only if CU is the zero vector.
-!
-  if ( cnorm == 0.0D+00 ) then
-    ier = 1
-    return
-  end if
-
-  c(1:3) = cu(1:3) / cnorm
-
-  return
-end
-subroutine covsph ( kk, n0, list, lptr, lend, lnew )
-
-!*****************************************************************************80
-!
-!! COVSPH connects an exterior node to boundary nodes, covering the sphere.
-!
-!  Discussion:
-!
-!    This subroutine connects an exterior node KK to all
-!    boundary nodes of a triangulation of KK-1 points on the
-!    unit sphere, producing a triangulation that covers the
-!    sphere.  The data structure is updated with the addition
-!    of node KK, but no optimization is performed.  All 
-!    boundary nodes must be visible from node KK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) KK = Index of the node to be connected to the
-!    set of all boundary nodes.  4 <= KK.
-!
-!    Input, integer ( kind = 4 ) N0 = Index of a boundary node (in the range
-!    1 to KK-1).  N0 may be determined by TRFIND.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the triangulation data structure created by TRMESH.  Node N0 must
-!    be included in the triangulation.  On output, updated with the addition 
-!    of node KK as the last entry.  The updated triangulation contains no
-!    boundary nodes.
-!
-!  Local parameters:
-!
-!    K =     Local copy of KK
-!    LP =    LIST pointer
-!    LSAV =  LIST pointer
-!    NEXT =  Boundary node visible from K
-!    NST =   Local copy of N0
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lsav
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nst
-
-  k = kk
-  nst = n0
-!
-!  Traverse the boundary in clockwise order, inserting K as
-!  the first neighbor of each boundary node, and converting
-!  the boundary node to an interior node.
-!
-  next = nst
-
-  do
-
-    lp = lend(next)
-    call insert ( k, lp, list, lptr, lnew )
-    next = -list(lp)
-    list(lp) = next
-
-    if ( next == nst ) then
-      exit
-    end if
-
-  end do
-!
-!  Traverse the boundary again, adding each node to K's adjacency list.
-!
-  lsav = lnew
-
-  do
-
-    lp = lend(next)
-    list(lnew) = next
-    lptr(lnew) = lnew + 1
-    lnew = lnew + 1
-    next = list(lp)
-
-    if ( next == nst ) then
-      exit
-    end if
-
-  end do
-
-  lptr(lnew-1) = lsav
-  lend(k) = lnew - 1
-
-  return
-end
-subroutine crlist ( n, ncol, x, y, z, list, lend, lptr, lnew, &
-  ltri, listc, nb, xc, yc, zc, rc, ier )
-
-!*****************************************************************************80
-!
-!! CRLIST returns triangle circumcenters and other information.
-!
-!  Discussion:
-!
-!    Given a Delaunay triangulation of nodes on the surface
-!    of the unit sphere, this subroutine returns the set of
-!    triangle circumcenters corresponding to Voronoi vertices,
-!    along with the circumradii and a list of triangle indexes
-!    LISTC stored in one-to-one correspondence with LIST/LPTR
-!    entries.
-!
-!    A triangle circumcenter is the point (unit vector) lying
-!    at the same angular distance from the three vertices and
-!    contained in the same hemisphere as the vertices.  (Note
-!    that the negative of a circumcenter is also equidistant
-!    from the vertices.)  If the triangulation covers the 
-!    surface, the Voronoi vertices are the circumcenters of the
-!    triangles in the Delaunay triangulation.  LPTR, LEND, and
-!    LNEW are not altered in this case.
-!
-!    On the other hand, if the nodes are contained in a
-!    single hemisphere, the triangulation is implicitly extended
-!    to the entire surface by adding pseudo-arcs (of length
-!    greater than 180 degrees) between boundary nodes forming
-!    pseudo-triangles whose 'circumcenters' are included in the
-!    list.  This extension to the triangulation actually 
-!    consists of a triangulation of the set of boundary nodes in
-!    which the swap test is reversed (a non-empty circumcircle
-!    test).  The negative circumcenters are stored as the
-!    pseudo-triangle 'circumcenters'.  LISTC, LPTR, LEND, and
-!    LNEW contain a data structure corresponding to the
-!    extended triangulation (Voronoi diagram), but LIST is not
-!    altered in this case.  Thus, if it is necessary to retain
-!    the original (unextended) triangulation data structure,
-!    copies of LPTR and LNEW must be saved before calling this
-!    routine.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.  Note that, if N = 3, there are only two Voronoi vertices 
-!    separated by 180 degrees, and the Voronoi regions are not well defined.
-!
-!    Input, integer ( kind = 4 ) NCOL, the number of columns reserved for LTRI.
-!    This must be at least NB-2, where NB is the number of boundary nodes.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes
-!    (unit vectors).
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), the set of adjacency lists.  
-!    Refer to TRMESH.
-!
-!    Input, integer ( kind = 4 ) LEND(N), the set of pointers to ends of 
-!    adjacency lists.  Refer to TRMESH.
-!
-!    Input/output, integer ( kind = 4 ) LPTR(6*(N-2)), pointers associated 
-!    with LIST.  Refer to TRMESH.  On output, pointers associated with LISTC. 
-!    Updated for the addition of pseudo-triangles if the original triangulation 
-!    contains boundary nodes (0 < NB).
-!
-!    Input/output, integer ( kind = 4 ) LNEW.  On input, a pointer to the first 
-!    empty location in LIST and LPTR (list length plus one).  On output, 
-!    pointer to the first empty location in LISTC and LPTR (list length plus 
-!    one).  LNEW is not altered if NB = 0.
-!
-!    Output, integer ( kind = 4 ) LTRI(6,NCOL).  Triangle list whose first NB-2
-!    columns contain the indexes of a clockwise-ordered sequence of vertices 
-!    (first three rows) followed by the LTRI column indexes of the triangles 
-!    opposite the vertices (or 0 denoting the exterior region) in the last
-!    three rows. This array is not generally of any further use outside this 
-!    routine.
-!
-!    Output, integer ( kind = 4 ) LISTC(3*NT), where NT = 2*N-4 is the number 
-!    of triangles in the triangulation (after extending it to cover the entire
-!    surface if necessary).  Contains the triangle indexes (indexes to XC, YC, 
-!    ZC, and RC) stored in 1-1 correspondence with LIST/LPTR entries (or entries
-!    that would be stored in LIST for the extended triangulation):  the index 
-!    of triangle (N1,N2,N3) is stored in LISTC(K), LISTC(L), and LISTC(M), 
-!    where LIST(K), LIST(L), and LIST(M) are the indexes of N2 as a neighbor 
-!    of N1, N3 as a neighbor of N2, and N1 as a neighbor of N3.  The Voronoi
-!    region associated with a node is defined by the CCW-ordered sequence of
-!    circumcenters in one-to-one correspondence with its adjacency
-!    list (in the extended triangulation).
-!
-!    Output, integer ( kind = 4 ) NB, the number of boundary nodes unless 
-!    IER = 1.
-!
-!    Output, real ( kind = 8 ) XC(2*N-4), YC(2*N-4), ZC(2*N-4), the coordinates
-!    of the triangle circumcenters (Voronoi vertices).  XC(I)**2 + YC(I)**2
-!    + ZC(I)**2 = 1.  The first NB-2 entries correspond to pseudo-triangles 
-!    if 0 < NB.
-!
-!    Output, real ( kind = 8 ) RC(2*N-4), the circumradii (the arc lengths or
-!    angles between the circumcenters and associated triangle vertices) in 
-!    1-1 correspondence with circumcenters.
-!
-!    Output, integer ( kind = 4 ) IER = Error indicator:
-!    0, if no errors were encountered.
-!    1, if N < 3.
-!    2, if NCOL < NB-2.
-!    3, if a triangle is degenerate (has vertices lying on a common geodesic).
-!
-!  Local parameters:
-!
-!    C =         Circumcenter returned by Subroutine CIRCUM
-!    I1,I2,I3 =  Permutation of (1,2,3):  LTRI row indexes
-!    I4 =        LTRI row index in the range 1 to 3
-!    IERR =      Error flag for calls to CIRCUM
-!    KT =        Triangle index
-!    KT1,KT2 =   Indexes of a pair of adjacent pseudo-triangles
-!    KT11,KT12 = Indexes of the pseudo-triangles opposite N1
-!                and N2 as vertices of KT1
-!    KT21,KT22 = Indexes of the pseudo-triangles opposite N1
-!                and N2 as vertices of KT2
-!    LP,LPN =    LIST pointers
-!    LPL =       LIST pointer of the last neighbor of N1
-!    N0 =        Index of the first boundary node (initial
-!                value of N1) in the loop on boundary nodes
-!                used to store the pseudo-triangle indexes
-!                in LISTC
-!    N1,N2,N3 =  Nodal indexes defining a triangle (CCW order)
-!                or pseudo-triangle (clockwise order)
-!    N4 =        Index of the node opposite N2 -> N1
-!    NM2 =       N-2
-!    NN =        Local copy of N
-!    NT =        Number of pseudo-triangles:  NB-2
-!    SWP =       Logical variable set to TRUE in each optimization
-!                loop (loop on pseudo-arcs) iff a swap is performed.
-!
-!    V1,V2,V3 =  Vertices of triangle KT = (N1,N2,N3) sent to subroutine 
-!                CIRCUM
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) ncol
-
-  real    ( kind = 8 ) c(3)
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) i4
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) kt
-  integer ( kind = 4 ) kt1
-  integer ( kind = 4 ) kt11
-  integer ( kind = 4 ) kt12
-  integer ( kind = 4 ) kt2
-  integer ( kind = 4 ) kt21
-  integer ( kind = 4 ) kt22
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) listc(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpn
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) ltri(6,ncol)
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) n4
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nm2
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nt
-  real    ( kind = 8 ) rc(2*n-4)
-  logical swp
-  logical swptst
-  real    ( kind = 8 ) t
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) v3(3)
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) xc(2*n-4)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) yc(2*n-4)
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) zc(2*n-4)
-
-  nn = n
-  nb = 0
-  nt = 0
-
-  if ( nn < 3 ) then
-    ier = 1
-    return
-  end if
-!
-!  Search for a boundary node N1.
-!
-  lp = 0
-
-  do n1 = 1, nn
-
-    if ( list(lend(n1)) < 0 ) then
-      lp = lend(n1)
-      exit
-    end if
-
-  end do
-!
-!  The triangulation already covers the sphere.
-!
-  if ( lp == 0 ) then
-    go to 9
-  end if
-!
-!  There are 3 <= NB boundary nodes.  Add NB-2 pseudo-triangles (N1,N2,N3) 
-!  by connecting N3 to the NB-3 boundary nodes to which it is not 
-!  already adjacent.
-!
-!  Set N3 and N2 to the first and last neighbors,
-!  respectively, of N1.
-!
-  n2 = -list(lp)
-  lp = lptr(lp)
-  n3 = list(lp)
-!
-!  Loop on boundary arcs N1 -> N2 in clockwise order,
-!  storing triangles (N1,N2,N3) in column NT of LTRI
-!  along with the indexes of the triangles opposite
-!  the vertices.
-!
-  do
-
-    nt = nt + 1
-
-    if ( nt <= ncol ) then
-      ltri(1,nt) = n1
-      ltri(2,nt) = n2
-      ltri(3,nt) = n3
-      ltri(4,nt) = nt + 1
-      ltri(5,nt) = nt - 1
-      ltri(6,nt) = 0
-    end if
-
-    n1 = n2
-    lp = lend(n1)
-    n2 = -list(lp)
-
-    if ( n2 == n3 ) then
-      exit
-    end if
-
-  end do
-
-  nb = nt + 2
-
-  if ( ncol < nt ) then
-    ier = 2
-    return
-  end if
-
-  ltri(4,nt) = 0
-!
-!  Optimize the exterior triangulation (set of pseudo-
-!  triangles) by applying swaps to the pseudo-arcs N1-N2
-!  (pairs of adjacent pseudo-triangles KT1 and KT1 < KT2).
-!  The loop on pseudo-arcs is repeated until no swaps are
-!  performed.
-!
-  if ( nt /= 1 ) then
-
-    do
-
-      swp = .false.
-
-      do kt1 = 1, nt-1
-
-        do i3 = 1, 3
-
-          kt2 = ltri(i3+3,kt1)
-
-          if ( kt2 <= kt1 ) then
-            cycle
-          end if
-!
-!  The LTRI row indexes (I1,I2,I3) of triangle KT1 =
-!  (N1,N2,N3) are a cyclical permutation of (1,2,3).
-!
-          if ( i3 == 1 ) then
-            i1 = 2
-            i2 = 3
-          else if ( i3 == 2 ) then
-            i1 = 3
-            i2 = 1
-          else
-            i1 = 1
-            i2 = 2
-          end if
-
-          n1 = ltri(i1,kt1)
-          n2 = ltri(i2,kt1)
-          n3 = ltri(i3,kt1)
-! 
-!  KT2 = (N2,N1,N4) for N4 = LTRI(I,KT2), where LTRI(I+3,KT2) = KT1.
-!
-          if ( ltri(4,kt2) == kt1 ) then
-            i4 = 1
-          else if ( ltri(5,kt2 ) == kt1 ) then
-            i4 = 2
-          else
-            i4 = 3
-          end if
-
-          n4 = ltri(i4,kt2)
-!
-!  The empty circumcircle test is reversed for the pseudo-
-!  triangles.  The reversal is implicit in the clockwise
-!  ordering of the vertices.
-!
-          if ( .not. swptst ( n1, n2, n3, n4, x, y, z ) ) then
-            cycle
-          end if
-!
-!  Swap arc N1-N2 for N3-N4.  KTij is the triangle opposite
-!  Nj as a vertex of KTi.
-!
-          swp = .true.
-          kt11 = ltri(i1+3,kt1)
-          kt12 = ltri(i2+3,kt1)
-
-          if ( i4 == 1 ) then
-            i2 = 2
-            i1 = 3
-          else if ( i4 == 2 ) then
-            i2 = 3
-            i1 = 1
-          else
-            i2 = 1
-            i1 = 2
-          end if
-
-          kt21 = ltri(i1+3,kt2)
-          kt22 = ltri(i2+3,kt2)
-          ltri(1,kt1) = n4
-          ltri(2,kt1) = n3
-          ltri(3,kt1) = n1
-          ltri(4,kt1) = kt12
-          ltri(5,kt1) = kt22
-          ltri(6,kt1) = kt2
-          ltri(1,kt2) = n3
-          ltri(2,kt2) = n4
-          ltri(3,kt2) = n2
-          ltri(4,kt2) = kt21
-          ltri(5,kt2) = kt11
-          ltri(6,kt2) = kt1
-!
-!  Correct the KT11 and KT22 entries that changed.
-!
-          if ( kt11 /= 0 ) then
-            i4 = 4
-            if ( ltri(4,kt11) /= kt1 ) then
-              i4 = 5
-              if ( ltri(5,kt11) /= kt1 ) i4 = 6
-            end if
-            ltri(i4,kt11) = kt2
-          end if
-
-          if ( kt22 /= 0 ) then
-            i4 = 4
-            if ( ltri(4,kt22) /= kt2 ) then
-              i4 = 5
-              if ( ltri(5,kt22) /= kt2 ) then
-                i4 = 6
-              end if
-            end if
-            ltri(i4,kt22) = kt1
-          end if
- 
-        end do
-
-      end do
-
-      if ( .not. swp ) then
-        exit
-      end if
-
-    end do
-
-  end if
-!
-!  Compute and store the negative circumcenters and radii of
-!  the pseudo-triangles in the first NT positions.
-!
-  do kt = 1, nt
-
-    n1 = ltri(1,kt)
-    n2 = ltri(2,kt)
-    n3 = ltri(3,kt)
-    v1(1) = x(n1)
-    v1(2) = y(n1)
-    v1(3) = z(n1)
-    v2(1) = x(n2)
-    v2(2) = y(n2)
-    v2(3) = z(n2)
-    v3(1) = x(n3)
-    v3(2) = y(n3)
-    v3(3) = z(n3)
-
-    call circum ( v1, v2, v3, c, ierr )
-
-    if ( ierr /= 0 ) then
-      ier = 3
-      return
-    end if
-!
-!  Store the negative circumcenter and radius (computed from <V1,C>).
-!
-    xc(kt) = c(1)
-    yc(kt) = c(2)
-    zc(kt) = c(3)
-
-    t = dot_product ( v1(1:3), c(1:3) )
-    t = max ( t, -1.0D+00 )
-    t = min ( t, +1.0D+00 )
-
-    rc(kt) = acos(t)
-
-  end do
-!
-!  Compute and store the circumcenters and radii of the
-!  actual triangles in positions KT = NT+1, NT+2, ...
-!
-!  Also, store the triangle indexes KT in the appropriate LISTC positions.
-!
-9 continue
-
-  kt = nt
-!
-!  Loop on nodes N1.
-!
-  nm2 = nn - 2
-
-  do n1 = 1, nm2
-
-    lpl = lend(n1)
-    lp = lpl
-    n3 = list(lp)
-!
-!  Loop on adjacent neighbors N2,N3 of N1 for which N1 < N2 and N1 < N3.
-!
-    do
-
-      lp = lptr(lp)
-      n2 = n3
-      n3 = abs ( list(lp) )
-
-      if ( n1 < n2 .and. n1 < n3 ) then
-
-        kt = kt + 1
-!
-!  Compute the circumcenter C of triangle KT = (N1,N2,N3).
-!
-        v1(1) = x(n1)
-        v1(2) = y(n1)
-        v1(3) = z(n1)
-        v2(1) = x(n2)
-        v2(2) = y(n2)
-        v2(3) = z(n2)
-        v3(1) = x(n3)
-        v3(2) = y(n3)
-        v3(3) = z(n3)
-
-        call circum ( v1, v2, v3, c, ierr )
-
-        if ( ierr /= 0 ) then
-          ier = 3
-          return
-        end if
-!
-!  Store the circumcenter, radius and triangle index.
-!
-        xc(kt) = c(1)
-        yc(kt) = c(2)
-        zc(kt) = c(3)
-
-        t = dot_product ( v1(1:3), c(1:3) )
-        t = max ( t, -1.0D+00 )
-        t = min ( t, +1.0D+00 )
- 
-        rc(kt) = acos(t)
-!
-!  Store KT in LISTC(LPN), where abs ( LIST(LPN) ) is the
-!  index of N2 as a neighbor of N1, N3 as a neighbor
-!  of N2, and N1 as a neighbor of N3.
-!
-        lpn = lstptr ( lpl, n2, list, lptr )
-        listc(lpn) = kt
-        lpn = lstptr ( lend(n2), n3, list, lptr )
-        listc(lpn) = kt
-        lpn = lstptr ( lend(n3), n1, list, lptr )
-        listc(lpn) = kt
-
-      end if
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-
-  if ( nt == 0 ) then
-    ier = 0
-    return
-  end if
-!
-!  Store the first NT triangle indexes in LISTC.
-!
-!  Find a boundary triangle KT1 = (N1,N2,N3) with a boundary arc opposite N3.
-!
-  kt1 = 0
-
-  do
-
-    kt1 = kt1 + 1
-
-    if ( ltri(4,kt1) == 0 ) then
-      i1 = 2
-      i2 = 3
-      i3 = 1
-      exit
-    else if ( ltri(5,kt1) == 0 ) then
-      i1 = 3
-      i2 = 1
-      i3 = 2
-      exit
-    else if ( ltri(6,kt1) == 0 ) then
-      i1 = 1
-      i2 = 2
-      i3 = 3
-      exit
-    end if
-
-  end do
-
-  n1 = ltri(i1,kt1)
-  n0 = n1
-!
-!  Loop on boundary nodes N1 in CCW order, storing the
-!  indexes of the clockwise-ordered sequence of triangles
-!  that contain N1.  The first triangle overwrites the
-!  last neighbor position, and the remaining triangles,
-!  if any, are appended to N1's adjacency list.
-!
-!  A pointer to the first neighbor of N1 is saved in LPN.
-!
-  do
-
-    lp = lend(n1)
-    lpn = lptr(lp)
-    listc(lp) = kt1
-!
-!  Loop on triangles KT2 containing N1.
-!
-    do
-
-      kt2 = ltri(i2+3,kt1)
-
-      if ( kt2 == 0 ) then
-        exit
-      end if
-!
-!  Append KT2 to N1's triangle list.
-!
-      lptr(lp) = lnew
-      lp = lnew
-      listc(lp) = kt2
-      lnew = lnew + 1
-!
-!  Set KT1 to KT2 and update (I1,I2,I3) such that LTRI(I1,KT1) = N1.
-!
-      kt1 = kt2
-
-      if ( ltri(1,kt1) == n1 ) then
-        i1 = 1
-        i2 = 2
-        i3 = 3
-      else if ( ltri(2,kt1) == n1 ) then
-        i1 = 2
-        i2 = 3
-        i3 = 1
-      else
-        i1 = 3
-        i2 = 1
-        i3 = 2
-      end if
-
-    end do
-!
-!  Store the saved first-triangle pointer in LPTR(LP), set
-!  N1 to the next boundary node, test for termination,
-!  and permute the indexes:  the last triangle containing
-!  a boundary node is the first triangle containing the
-!  next boundary node.
-!
-    lptr(lp) = lpn
-    n1 = ltri(i3,kt1)
-
-    if ( n1 == n0 ) then
-      exit
-    end if
-
-    i4 = i3
-    i3 = i2
-    i2 = i1
-    i1 = i4
-
-  end do
-
-  ier = 0
-
-  return
-end
-subroutine delarc ( n, io1, io2, list, lptr, lend, lnew, ier )
-
-!*****************************************************************************80
-!
-!! DELARC deletes a boundary arc from a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine deletes a boundary arc from a triangulation
-!    It may be used to remove a null triangle from the
-!    convex hull boundary.  Note, however, that if the union of
-!    triangles is rendered nonconvex, subroutines DELNOD, EDGE,
-!    and TRFIND (and hence ADDNOD) may fail.  Also, function
-!    NEARND should not be called following an arc deletion.
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    4 <= N.
-!
-!    Input, integer ( kind = 4 ) IO1, IO2, indexes (in the range 1 to N) of
-!    a pair of adjacent boundary nodes defining the arc to be removed.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the triangulation data structure created by TRMESH.  On output, 
-!    updated with the removal of arc IO1-IO2 unless 0 < IER.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if N, IO1, or IO2 is outside its valid range, or IO1 = IO2.
-!    2, if IO1-IO2 is not a boundary arc.
-!    3, if the node opposite IO1-IO2 is already a boundary node, and thus IO1
-!      or IO2 has only two neighbors or a deletion would result in two 
-!      triangulations sharing a single node.
-!    4, if one of the nodes is a neighbor of the other, but not vice versa,
-!      implying an invalid triangulation data structure.
-!
-!  Local parameters:
-!
-!    LP =       LIST pointer
-!    LPH =      LIST pointer or flag returned by DELNB
-!    LPL =      Pointer to the last neighbor of N1, N2, or N3
-!    N1,N2,N3 = Nodal indexes of a triangle such that N1->N2
-!               is the directed boundary edge associated with IO1-IO2
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-
-  n1 = io1
-  n2 = io2
-!
-!  Test for errors.
-!
-  if ( n < 4 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n1 < 1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n < n1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n2 < 1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n < n2 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n1 == n2 ) then
-    ier = 1
-    return
-  end if
-!
-!  Set N1->N2 to the directed boundary edge associated with IO1-IO2:  
-!  (N1,N2,N3) is a triangle for some N3.
-!
-  lpl = lend(n2)
-
-  if ( -list(lpl) /= n1 ) then
-    n1 = n2
-    n2 = io1
-    lpl = lend(n2)
-    if ( -list(lpl) /= n1 ) then
-      ier = 2
-      return
-    end if
-  end if
-!
-!  Set N3 to the node opposite N1->N2 (the second neighbor
-!  of N1), and test for error 3 (N3 already a boundary node).
-!
-  lpl = lend(n1)
-  lp = lptr(lpl)
-  lp = lptr(lp)
-  n3 = abs ( list(lp) )
-  lpl = lend(n3)
-
-  if ( list(lpl) <= 0 ) then
-    ier = 3
-    return
-  end if
-!
-!  Delete N2 as a neighbor of N1, making N3 the first
-!  neighbor, and test for error 4 (N2 not a neighbor
-!  of N1).  Note that previously computed pointers may
-!  no longer be valid following the call to DELNB.
-!
-  call delnb ( n1, n2, n, list, lptr, lend, lnew, lph )
-
-  if ( lph < 0 ) then
-    ier = 4
-    return
-  end if
-!
-!  Delete N1 as a neighbor of N2, making N3 the new last neighbor.
-!
-  call delnb ( n2, n1, n, list, lptr, lend, lnew, lph )
-!
-!  Make N3 a boundary node with first neighbor N2 and last neighbor N1.
-!
-  lp = lstptr ( lend(n3), n1, list, lptr )
-  lend(n3) = lp
-  list(lp) = -n1
-!
-!  No errors encountered.
-!
-  ier = 0
-
-  return
-end
-subroutine delnb ( n0, nb, n, list, lptr, lend, lnew, lph )
-
-!*****************************************************************************80
-!
-!! DELNB deletes a neighbor from the adjacency list.
-!
-!  Discussion:
-!
-!    This subroutine deletes a neighbor NB from the adjacency
-!    list of node N0 (but N0 is not deleted from the adjacency
-!    list of NB) and, if NB is a boundary node, makes N0 a
-!    boundary node.  
-!
-!    For pointer (LIST index) LPH to NB as a neighbor of N0, the empty 
-!    LIST, LPTR location LPH is filled in with the values at LNEW-1, 
-!    pointer LNEW-1 (in LPTR and possibly in LEND) is changed to LPH, 
-!    and LNEW is decremented.
-!
-!    This requires a search of LEND and LPTR entailing an
-!    expected operation count of O(N).
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka,
-!    Department of Computer Science,
-!    University of North Texas,
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N0, NB, indexes, in the range 1 to N, of a 
-!    pair of nodes such that NB is a neighbor of N0.  (N0 need not be a 
-!    neighbor of NB.)
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), LNEW, 
-!    the data structure defining the triangulation.  On output, updated with 
-!    the removal of NB from the adjacency list of N0 unless LPH < 0.
-!
-!    Input, integer ( kind = 4 ) LPH, list pointer to the hole (NB as a 
-!    neighbor of N0) filled in by the values at LNEW-1 or error indicator:
-!    >  0, if no errors were encountered.
-!    = -1, if N0, NB, or N is outside its valid range.
-!    = -2, if NB is not a neighbor of N0.
-!
-!  Local parameters:
-!
-!    I =   DO-loop index
-!    LNW = LNEW-1 (output value of LNEW)
-!    LP =  LIST pointer of the last neighbor of NB
-!    LPB = Pointer to NB as a neighbor of N0
-!    LPL = Pointer to the last neighbor of N0
-!    LPP = Pointer to the neighbor of N0 that precedes NB
-!    NN =  Local copy of N
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lnw
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpb
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpp
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nn
-
-  nn = n
-!
-!  Test for error 1.
-!
-  if ( n0 < 1 ) then
-    lph = -1
-    return
-  end if
-
-  if ( nn < n0 .or. nb < 1  .or. &
-      nn < nb .or. nn < 3 ) then
-    lph = -1
-    return
-  end if
-!
-!  Find pointers to neighbors of N0:
-!
-!  LPL points to the last neighbor,
-!  LPP points to the neighbor NP preceding NB, and
-!  LPB points to NB.
-!
-  lpl = lend(n0)
-  lpp = lpl
-  lpb = lptr(lpp)
-
-  do
-
-    if ( list(lpb) == nb ) then
-      go to 2
-    end if
-
-    lpp = lpb
-    lpb = lptr(lpp)
-
-    if ( lpb == lpl ) then
-      exit
-    end if
-
-  end do
-!
-!  Test for error 2 (NB not found).
-!
-  if ( abs ( list(lpb) ) /= nb ) then
-    lph = -2
-    return
-  end if
-!
-!  NB is the last neighbor of N0.  Make NP the new last
-!  neighbor and, if NB is a boundary node, then make N0
-!  a boundary node.
-!
-  lend(n0) = lpp
-  lp = lend(nb)
-
-  if ( list(lp) < 0 ) then
-    list(lpp) = -list(lpp)
-  end if
-
-  go to 3
-!
-!  NB is not the last neighbor of N0.  If NB is a boundary
-!  node and N0 is not, then make N0 a boundary node with
-!  last neighbor NP.
-!
-2 continue
-
-  lp = lend(nb)
-
-  if ( list(lp) < 0 .and. 0 < list(lpl) ) then
-    lend(n0) = lpp
-    list(lpp) = -list(lpp)
-  end if
-!
-!  Update LPTR so that the neighbor following NB now follows
-!  NP, and fill in the hole at location LPB.
-!
-3 continue
-
-  lptr(lpp) = lptr(lpb)
-  lnw = lnew-1
-  list(lpb) = list(lnw)
-  lptr(lpb) = lptr(lnw)
-
-  do i = nn, 1, -1
-    if ( lend(i) == lnw ) then
-      lend(i) = lpb
-      exit
-    end if
-  end do
-
-  do i = 1, lnw-1
-    if ( lptr(i) == lnw ) then
-      lptr(i) = lpb
-    end if
-  end do
-!
-!  No errors encountered.
-!
-  lnew = lnw
-  lph = lpb
-
-  return
-end
-subroutine delnod ( k, n, x, y, z, list, lptr, lend, lnew, lwk, iwk, ier )
-
-!*****************************************************************************80
-!
-!! DELNOD deletes a node from a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine deletes node K (along with all arcs incident on node K)
-!    from a triangulation of N nodes on the unit sphere, and inserts arcs as
-!    necessary to produce a triangulation of the remaining N-1 nodes.  If a
-!    Delaunay triangulation is input, a Delaunay triangulation will result, 
-!    and thus, DELNOD reverses the effect of a call to ADDNOD.
-!
-!    Note that the deletion may result in all remaining nodes
-!    being collinear.  This situation is not flagged.
-!
-!  Modified:
-!
-!    17 June 2002
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) K, index (for X, Y, and Z) of the node to be
-!    deleted.  1 <= K <= N.
-!
-!    Input/output, integer ( kind = 4 ) N, the number of nodes in the 
-!    triangulation.  4 <= N.  Note that N will be decremented following the 
-!    deletion.
-!
-!    Input/output, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of 
-!    the nodes in the triangulation.  On output, updated with elements
-!    K+1,...,N+1 shifted up one position, thus overwriting element K, 
-!    unless 1 <= IER <= 4.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the data structure defining the triangulation, created by TRMESH.  
-!    On output, updated to reflect the deletion unless 1 <= IER <= 4.  
-!    Note that the data structure may have been altered if 3 < IER.
-!
-!    Input/output, integer ( kind = 4 ) LWK, the number of columns reserved for 
-!    IWK.  LWK must be at least NNB-3, where NNB is the number of neighbors of 
-!    node K, including an extra pseudo-node if K is a boundary node.
-!    On output, the number of IWK columns required unless IER = 1 or IER = 3.
-!
-!    Output, integer ( kind = 4 ) IWK(2,LWK), indexes of the endpoints of the 
-!    new arcs added unless LWK = 0 or 1 <= IER <= 4.  (Arcs are associated with
-!    columns.)
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if K or N is outside its valid range or LWK < 0 on input.
-!    2, if more space is required in IWK.  Refer to LWK.
-!    3, if the triangulation data structure is invalid on input.
-!    4, if K indexes an interior node with four or more neighbors, none of 
-!      which can be swapped out due to collinearity, and K cannot therefore 
-!      be deleted.
-!    5, if an error flag (other than IER = 1) was returned by OPTIM.  An error
-!      message is written to the standard output unit in this case.
-!    6, if error flag 1 was returned by OPTIM.  This is not necessarily an
-!      error, but the arcs may not be optimal.
-!
-!  Local parameters:
-!
-!    BDRY =    Logical variable with value TRUE iff N1 is a boundary node
-!    I,J =     DO-loop indexes
-!    IERR =    Error flag returned by OPTIM
-!    IWL =     Number of IWK columns containing arcs
-!    LNW =     Local copy of LNEW
-!    LP =      LIST pointer
-!    LP21 =    LIST pointer returned by SWAP
-!    LPF,LPL = Pointers to the first and last neighbors of N1
-!    LPH =     Pointer (or flag) returned by DELNB
-!    LPL2 =    Pointer to the last neighbor of N2
-!    LPN =     Pointer to a neighbor of N1
-!    LWKL =    Input value of LWK
-!    N1 =      Local copy of K
-!    N2 =      Neighbor of N1
-!    NFRST =   First neighbor of N1:  LIST(LPF)
-!    NIT =     Number of iterations in OPTIM
-!    NR,NL =   Neighbors of N1 preceding (to the right of) and
-!              following (to the left of) N2, respectively
-!    NN =      Number of nodes in the triangulation
-!    NNB =     Number of neighbors of N1 (including a pseudo-
-!              node representing the boundary if N1 is a
-!              boundary node)
-!    X1,Y1,Z1 = Coordinates of N1
-!    X2,Y2,Z2 = Coordinates of N2
-!    XL,YL,ZL = Coordinates of NL
-!    XR,YR,ZR = Coordinates of NR
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  logical bdry
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) iwk(2,*)
-  integer ( kind = 4 ) iwl
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) k
-  logical left
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lnw
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lpf
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpl2
-  integer ( kind = 4 ) lpn
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) lwk
-  integer ( kind = 4 ) lwkl
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) nbcnt
-  integer ( kind = 4 ) nfrst
-  integer ( kind = 4 ) nit
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nnb
-  integer ( kind = 4 ) nr
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) xl
-  real    ( kind = 8 ) xr
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) yl
-  real    ( kind = 8 ) yr
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-  real    ( kind = 8 ) zl
-  real    ( kind = 8 ) zr
-!
-!  Set N1 to K and NNB to the number of neighbors of N1 (plus
-!  one if N1 is a boundary node), and test for errors.  LPF
-!  and LPL are LIST indexes of the first and last neighbors
-!  of N1, IWL is the number of IWK columns containing arcs,
-!  and BDRY is TRUE iff N1 is a boundary node.
-!
-  n1 = k
-  nn = n
-
-  if ( n1 < 1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( nn < n1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( nn < 4 ) then
-    ier = 1
-    return
-  end if
-
-  if ( lwk < 0 ) then
-    ier = 1
-    return
-  end if
-
-  lpl = lend(n1)
-  lpf = lptr(lpl)
-  nnb = nbcnt(lpl,lptr)
-  bdry = list(lpl) < 0
-
-  if ( bdry ) then
-    nnb = nnb + 1
-  end if
-
-  if ( nnb < 3 ) then
-    ier = 3
-    return
-  end if
-
-  lwkl = lwk
-  lwk = nnb - 3
-
-  if ( lwkl < lwk ) then
-    ier = 2
-    return
-  end if
-
-  iwl = 0
-
-  if ( nnb == 3 ) then
-    go to 3
-  end if
-!
-!  Initialize for loop on arcs N1-N2 for neighbors N2 of N1,
-!  beginning with the second neighbor.  NR and NL are the
-!  neighbors preceding and following N2, respectively, and
-!  LP indexes NL.  The loop is exited when all possible
-!  swaps have been applied to arcs incident on N1.
-!
-  x1 = x(n1)
-  y1 = y(n1)
-  z1 = z(n1)
-  nfrst = list(lpf)
-  nr = nfrst
-  xr = x(nr)
-  yr = y(nr)
-  zr = z(nr)
-  lp = lptr(lpf)
-  n2 = list(lp)
-  x2 = x(n2)
-  y2 = y(n2)
-  z2 = z(n2)
-  lp = lptr(lp)
-!
-!  Top of loop:  set NL to the neighbor following N2.
-!
-  do
-
-    nl = abs ( list(lp) )
-
-    if ( nl == nfrst .and. bdry ) then
-      exit
-    end if
-
-    xl = x(nl)
-    yl = y(nl)
-    zl = z(nl)
-!
-!  Test for a convex quadrilateral.  To avoid an incorrect
-!  test caused by collinearity, use the fact that if N1
-!  is a boundary node, then N1 LEFT NR->NL and if N2 is
-!  a boundary node, then N2 LEFT NL->NR.
-!
-    lpl2 = lend(n2)
-!
-!  Nonconvex quadrilateral -- no swap is possible.
-!
-    if ( .not. ((bdry .or. left(xr,yr,zr,xl,yl,zl,x1,y1, &
-        z1)) .and. (list(lpl2) < 0  .or. &
-        left(xl,yl,zl,xr,yr,zr,x2,y2,z2))) ) then
-      nr = n2
-      xr = x2
-      yr = y2
-      zr = z2
-      go to 2
-    end if
-!
-!  The quadrilateral defined by adjacent triangles
-!  (N1,N2,NL) and (N2,N1,NR) is convex.  Swap in
-!  NL-NR and store it in IWK unless NL and NR are
-!  already adjacent, in which case the swap is not
-!  possible.  Indexes larger than N1 must be decremented
-!  since N1 will be deleted from X, Y, and Z.
-!
-    call swap ( nl, nr, n1, n2, list, lptr, lend, lp21 )
-
-    if ( lp21 == 0 ) then
-      nr = n2
-      xr = x2
-      yr = y2
-      zr = z2
-      go to 2
-    end if
-
-    iwl = iwl + 1
-
-    if ( nl <= n1 ) then
-      iwk(1,iwl) = nl
-    else
-      iwk(1,iwl) = nl - 1
-    end if
-
-    if ( nr <= n1 ) then
-      iwk(2,iwl) = nr
-    else
-      iwk(2,iwl) = nr - 1
-    end if
-!
-!  Recompute the LIST indexes and NFRST, and decrement NNB.
-!
-    lpl = lend(n1)
-    nnb = nnb - 1
-
-    if ( nnb == 3 ) then
-      exit
-    end if
-
-    lpf = lptr(lpl)
-    nfrst = list(lpf)
-    lp = lstptr ( lpl, nl, list, lptr )
-!
-!  NR is not the first neighbor of N1.
-!  Back up and test N1-NR for a swap again:  Set N2 to
-!  NR and NR to the previous neighbor of N1 -- the
-!  neighbor of NR which follows N1.  LP21 points to NL
-!  as a neighbor of NR.
-!
-    if ( nr /= nfrst ) then
-
-      n2 = nr
-      x2 = xr
-      y2 = yr
-      z2 = zr
-      lp21 = lptr(lp21)
-      lp21 = lptr(lp21)
-      nr = abs ( list(lp21) )
-      xr = x(nr)
-      yr = y(nr)
-      zr = z(nr)
-      cycle
-
-    end if
-!
-!  Bottom of loop -- test for termination of loop.
-!
-2   continue
-
-    if ( n2 == nfrst ) then
-      exit
-    end if
-
-    n2 = nl
-    x2 = xl
-    y2 = yl
-    z2 = zl
-    lp = lptr(lp)
-
-  end do
-!
-!  Delete N1 and all its incident arcs.  If N1 is an interior
-!  node and either 3 < NNB or NNB = 3 and N2 LEFT NR->NL,
-!  then N1 must be separated from its neighbors by a plane
-!  containing the origin -- its removal reverses the effect
-!  of a call to COVSPH, and all its neighbors become
-!  boundary nodes.  This is achieved by treating it as if
-!  it were a boundary node (setting BDRY to TRUE, changing
-!  a sign in LIST, and incrementing NNB).
-!
-3   continue
-
-  if ( .not. bdry ) then
-
-    if ( 3 < nnb ) then
-      bdry = .true.
-    else
-      lpf = lptr(lpl)
-      nr = list(lpf)
-      lp = lptr(lpf)
-      n2 = list(lp)
-      nl = list(lpl)
-      bdry = left ( x(nr), y(nr), z(nr), x(nl), y(nl), z(nl), &
-        x(n2), y(n2), z(n2) )
-    end if
-!
-!  If a boundary node already exists, then N1 and its
-!  neighbors cannot be converted to boundary nodes.
-!  (They must be collinear.)  This is a problem if 3 < NNB.
-!
-    if ( bdry ) then
-
-      do i = 1, nn
-        if ( list(lend(i)) < 0 ) then
-          bdry = .false.
-          go to 5
-        end if
-      end do
-
-      list(lpl) = -list(lpl)
-      nnb = nnb + 1
-
-    end if
-
-  end if
-
-5 continue
-
-  if ( .not. bdry .and. 3 < nnb ) then
-    ier = 4
-    return
-  end if
-!
-!  Initialize for loop on neighbors.  LPL points to the last
-!  neighbor of N1.  LNEW is stored in local variable LNW.
-!
-  lp = lpl
-  lnw = lnew
-!
-!  Loop on neighbors N2 of N1, beginning with the first.
-!
-6   continue
-
-    lp = lptr(lp)
-    n2 = abs ( list(lp) )
-
-    call delnb ( n2, n1, n, list, lptr, lend, lnw, lph )
-
-    if ( lph < 0 ) then
-      ier = 3
-      return
-    end if
-!
-!  LP and LPL may require alteration.
-!
-    if ( lpl == lnw ) then
-      lpl = lph
-    end if
-
-    if ( lp == lnw ) then
-      lp = lph
-    end if
-
-    if ( lp /= lpl ) then
-      go to 6
-    end if
-!
-!  Delete N1 from X, Y, Z, and LEND, and remove its adjacency
-!  list from LIST and LPTR.  LIST entries (nodal indexes)
-!  which are larger than N1 must be decremented.
-!
-  nn = nn - 1
-
-  if ( nn < n1 ) then
-    go to 9
-  end if
-
-  do i = n1, nn
-    x(i) = x(i+1)
-    y(i) = y(i+1)
-    z(i) = z(i+1)
-    lend(i) = lend(i+1)
-  end do
-
-  do i = 1, lnw-1
-
-    if ( n1 < list(i) ) then
-      list(i) = list(i) - 1
-    end if
-
-    if ( list(i) < -n1 ) then
-      list(i) = list(i) + 1
-    end if
-
-  end do
-!
-!  For LPN = first to last neighbors of N1, delete the
-!  preceding neighbor (indexed by LP).
-!
-!  Each empty LIST,LPTR location LP is filled in with the
-!  values at LNW-1, and LNW is decremented.  All pointers
-!  (including those in LPTR and LEND) with value LNW-1
-!  must be changed to LP.
-!
-!  LPL points to the last neighbor of N1.
-!
-9 continue
-
-  if ( bdry ) then
-    nnb = nnb - 1
-  end if
-
-  lpn = lpl
-
-  do j = 1, nnb
-
-    lnw = lnw - 1
-    lp = lpn
-    lpn = lptr(lp)
-    list(lp) = list(lnw)
-    lptr(lp) = lptr(lnw)
-
-    if ( lptr(lpn) == lnw ) then
-      lptr(lpn) = lp
-    end if
-
-    if ( lpn == lnw ) then
-      lpn = lp
-    end if
-
-    do i = nn, 1, -1
-      if ( lend(i) == lnw ) then
-        lend(i) = lp
-        exit
-      end if
-    end do
-
-    do i = lnw-1, 1, -1
-      if ( lptr(i) == lnw ) then
-        lptr(i) = lp
-      end if
-    end do
-
-  end do
-!
-!  Update N and LNEW, and optimize the patch of triangles
-!  containing K (on input) by applying swaps to the arcs in IWK.
-!
-  n = nn
-  lnew = lnw
-
-  if ( 0 < iwl ) then
-
-    nit = 4 * iwl
-
-    call optim ( x, y, z, iwl, list, lptr, lend, nit, iwk, ierr )
-
-    if ( ierr /= 0 .and. ierr /= 1 ) then
-      ier = 5
-      return
-    end if
-
-    if ( ierr == 1 ) then
-      ier = 6
-      return
-    end if
-
-  end if
-
-  ier = 0
-
-  return
-end
-subroutine edge ( in1, in2, x, y, z, lwk, iwk, list, lptr, lend, ier )
-
-!*****************************************************************************80
-!
-!! EDGE swaps arcs to force two nodes to be adjacent.
-!
-!  Discussion:
-!
-!    Given a triangulation of N nodes and a pair of nodal
-!    indexes IN1 and IN2, this routine swaps arcs as necessary
-!    to force IN1 and IN2 to be adjacent.  Only arcs which
-!    intersect IN1-IN2 are swapped out.  If a Delaunay triangu-
-!    lation is input, the resulting triangulation is as close
-!    as possible to a Delaunay triangulation in the sense that
-!    all arcs other than IN1-IN2 are locally optimal.
-!
-!    A sequence of calls to EDGE may be used to force the
-!    presence of a set of edges defining the boundary of a
-!    non-convex and/or multiply connected region, or to introduce
-!    barriers into the triangulation.  Note that 
-!    GETNP will not necessarily return closest nodes if the
-!    triangulation has been constrained by a call to EDGE.
-!    However, this is appropriate in some applications, such
-!    as triangle-based interpolation on a nonconvex domain.
-!
-!  Modified:
-!
-!    17 June 2002
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) IN1, IN2, indexes (of X, Y, and Z) in the 
-!    range 1 to N defining a pair of nodes to be connected by an arc.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes.
-!
-!    Input/output, integer ( kind = 4 ) LWK.  On input, the number of columns 
-!    reserved for IWK.  This must be at least NI, the number of arcs that 
-!    intersect IN1-IN2.  (NI is bounded by N-3.)   On output, the number of 
-!    arcs which intersect IN1-IN2 (but not more than the input value of LWK) 
-!    unless IER = 1 or IER = 3.  LWK = 0 if and only if IN1 and IN2 were 
-!    adjacent (or LWK=0) on input.
-!
-!    Output, integer ( kind = 4 ) IWK(2*LWK), the indexes of the endpoints of 
-!    the new arcs other than IN1-IN2 unless 0 < IER or LWK = 0.  New arcs to
-!    the left of IN1->IN2 are stored in the first K-1 columns (left portion 
-!    of IWK), column K contains zeros, and new arcs to the right of IN1->IN2
-!    occupy columns K+1,...,LWK.  (K can be determined by searching IWK 
-!    for the zeros.)
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), 
-!    the data structure defining the triangulation, created by TRMESH.  On 
-!    output, updated if necessary to reflect the presence of an arc connecting 
-!    IN1 and IN2 unless 0 < IER.  The data structure has been altered if 
-!    4 <= IER.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if IN1 < 1, IN2 < 1, IN1 = IN2, or LWK < 0 on input.
-!    2, if more space is required in IWK.  Refer to LWK.
-!    3, if IN1 and IN2 could not be connected due to either an invalid 
-!      data structure or collinear nodes (and floating point error).
-!    4, if an error flag other than IER = 1 was returned by OPTIM.
-!    5, if error flag 1 was returned by OPTIM.  This is not necessarily 
-!      an error, but the arcs other than IN1-IN2 may not be optimal.
-!
-!  Local parameters:
-!
-!    DPij =     Dot product <Ni,Nj>
-!    I =        DO-loop index and column index for IWK
-!    IERR =     Error flag returned by Subroutine OPTIM
-!    IWC =      IWK index between IWF and IWL -- NL->NR is
-!               stored in IWK(1,IWC)->IWK(2,IWC)
-!    IWCP1 =    IWC + 1
-!    IWEND =    Input or output value of LWK
-!    IWF =      IWK (column) index of the first (leftmost) arc
-!               which intersects IN1->IN2
-!    IWL =      IWK (column) index of the last (rightmost) are
-!               which intersects IN1->IN2
-!    LFT =      Flag used to determine if a swap results in the
-!               new arc intersecting IN1-IN2 -- LFT = 0 iff
-!               N0 = IN1, LFT = -1 implies N0 LEFT IN1->IN2,
-!               and LFT = 1 implies N0 LEFT IN2->IN1
-!    LP =       List pointer (index for LIST and LPTR)
-!    LP21 =     Unused parameter returned by SWAP
-!    LPL =      Pointer to the last neighbor of IN1 or NL
-!    N0 =       Neighbor of N1 or node opposite NR->NL
-!    N1,N2 =    Local copies of IN1 and IN2
-!    N1FRST =   First neighbor of IN1
-!    N1LST =    (Signed) last neighbor of IN1
-!    NEXT =     Node opposite NL->NR
-!    NIT =      Flag or number of iterations employed by OPTIM
-!    NL,NR =    Endpoints of an arc which intersects IN1-IN2
-!               with NL LEFT IN1->IN2
-!    X0,Y0,Z0 = Coordinates of N0
-!    X1,Y1,Z1 = Coordinates of IN1
-!    X2,Y2,Z2 = Coordinates of IN2
-!
-  implicit none
-
-  real    ( kind = 8 ) dp12
-  real    ( kind = 8 ) dp1l
-  real    ( kind = 8 ) dp1r
-  real    ( kind = 8 ) dp2l
-  real    ( kind = 8 ) dp2r
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) in1
-  integer ( kind = 4 ) in2
-  integer ( kind = 4 ) iwc
-  integer ( kind = 4 ) iwcp1
-  integer ( kind = 4 ) iwend
-  integer ( kind = 4 ) iwf
-  integer ( kind = 4 ) iwk(2,*)
-  integer ( kind = 4 ) iwl
-  logical left
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) lft
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lwk
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n1frst
-  integer ( kind = 4 ) n1lst
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nit
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ) nr
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-!
-!  Store IN1, IN2, and LWK in local variables and test for errors.
-!
-  n1 = in1
-  n2 = in2
-  iwend = lwk
-
-  if ( n1 < 1 .or. n2 < 1 .or. n1 == n2  .or. iwend < 0 ) then
-    ier = 1
-    return
-  end if
-!
-!  Test for N2 as a neighbor of N1.  LPL points to the last neighbor of N1.
-!
-  lpl = lend(n1)
-  n0 = abs ( list(lpl) )
-  lp = lpl
-
-  do
-
-    if ( n0 == n2 ) then
-      ier = 0
-      return
-    end if
-
-    lp = lptr(lp)
-    n0 = list(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-  end do
-!
-!  Initialize parameters.
-!
-  iwl = 0
-  nit = 0
-!
-!  Store the coordinates of N1 and N2.
-!
-  do
-
-    x1 = x(n1)
-    y1 = y(n1)
-    z1 = z(n1)
-
-    x2 = x(n2)
-    y2 = y(n2)
-    z2 = z(n2)
-!
-!  Set NR and NL to adjacent neighbors of N1 such that
-!  NR LEFT N2->N1 and NL LEFT N1->N2,
-!  (NR Forward N1->N2 or NL Forward N1->N2), and
-!  (NR Forward N2->N1 or NL Forward N2->N1).
-!
-!  Initialization:  Set N1FRST and N1LST to the first and
-!  (signed) last neighbors of N1, respectively, and
-!  initialize NL to N1FRST.
-!
-    lpl = lend(n1)
-    n1lst = list(lpl)
-    lp = lptr(lpl)
-    n1frst = list(lp)
-    nl = n1frst
-
-    if ( n1lst < 0 ) then
-      go to 4
-    end if
-!
-!  N1 is an interior node.  Set NL to the first candidate
-!  for NR (NL LEFT N2->N1).
-!
-    do
-
-      if ( left ( x2, y2, z2, x1, y1, z1, x(nl), y(nl), z(nl) ) ) then
-        go to 4
-      end if
-
-      lp = lptr(lp)
-      nl = list(lp)
-
-      if ( nl == n1frst ) then
-        exit
-      end if
-
-    end do
-!
-!  All neighbors of N1 are strictly left of N1->N2.
-!
-    go to 5
-!
-!  NL = LIST(LP) LEFT N2->N1.  Set NR to NL and NL to the
-!  following neighbor of N1.
-!
-4   continue
-
-    do
-
-      nr = nl
-      lp = lptr(lp)
-      nl = abs ( list(lp) )
-!
-!  NL LEFT N1->N2 and NR LEFT N2->N1.  The Forward tests
-!  are employed to avoid an error associated with
-!  collinear nodes.
-!
-      if ( left ( x1, y1, z1, x2, y2, z2, x(nl), y(nl), z(nl) ) ) then
-
-        dp12 = x1 * x2 + y1 * y2 + z1 * z2
-        dp1l = x1 * x(nl) + y1 * y(nl) + z1 * z(nl)
-        dp2l = x2 * x(nl) + y2 * y(nl) + z2 * z(nl)
-        dp1r = x1 * x(nr) + y1 * y(nr) + z1 * z(nr)
-        dp2r = x2 * x(nr) + y2 * y(nr) + z2 * z(nr)
-
-        if ( ( 0.0D+00 <= dp2l - dp12 * dp1l .or. &
-               0.0D+00 <= dp2r - dp12 * dp1r )  .and. &
-             ( 0.0D+00 <= dp1l - dp12 * dp2l .or.  &
-               0.0D+00 <= dp1r - dp12 * dp2r ) ) then
-          go to 6
-        end if
-!
-!  NL-NR does not intersect N1-N2.  However, there is
-!  another candidate for the first arc if NL lies on
-!  the line N1-N2.
-!
-        if ( .not. left ( x2, y2, z2, x1, y1, z1, x(nl), y(nl), z(nl) ) ) then
-          exit
-        end if
-
-      end if
-!
-!  Bottom of loop.
-!
-      if ( nl == n1frst ) then
-        exit
-      end if
-
-    end do
-!
-!  Either the triangulation is invalid or N1-N2 lies on the
-!  convex hull boundary and an edge NR->NL (opposite N1 and
-!  intersecting N1-N2) was not found due to floating point
-!  error.  Try interchanging N1 and N2 -- NIT > 0 iff this
-!  has already been done.
-!
-5   continue
-
-    if ( 0 < nit ) then
-      ier = 3
-      return
-    end if
-
-    nit = 1
-    call i4_swap ( n1, n2 )
-
-  end do
-!
-!  Store the ordered sequence of intersecting edges NL->NR in
-!  IWK(1,IWL)->IWK(2,IWL).
-!
-6 continue
-
-  iwl = iwl + 1
-
-  if ( iwend < iwl ) then
-    ier = 2
-    return
-  end if
-
-  iwk(1,iwl) = nl
-  iwk(2,iwl) = nr
-!
-!  Set NEXT to the neighbor of NL which follows NR.
-!
-  lpl = lend(nl)
-  lp = lptr(lpl)
-!
-!  Find NR as a neighbor of NL.  The search begins with the first neighbor.
-!
-  do
-
-    if ( list(lp) == nr ) then
-      go to 8
-    end if
-
-    lp = lptr(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-  end do
-!
-!  NR must be the last neighbor, and NL->NR cannot be a boundary edge.
-!
-  if ( list(lp) /= nr ) then
-    ier = 3
-    return
-  end if
-!
-!  Set NEXT to the neighbor following NR, and test for
-!  termination of the store loop.
-!
-8 continue
-
-  lp = lptr(lp)
-  next = abs ( list(lp) )
-!
-!  Set NL or NR to NEXT.
-!
-  if ( next /= n2 ) then
-
-    if ( left ( x1, y1, z1, x2, y2, z2, x(next), y(next), z(next) ) ) then
-      nl = next
-    else
-      nr = next
-    end if
-
-    go to 6
-
-  end if
-!
-!  IWL is the number of arcs which intersect N1-N2.
-!  Store LWK.
-!
-9 continue
-
-  lwk = iwl
-  iwend = iwl
-!
-!  Initialize for edge swapping loop -- all possible swaps
-!  are applied (even if the new arc again intersects
-!  N1-N2), arcs to the left of N1->N2 are stored in the
-!  left portion of IWK, and arcs to the right are stored in
-!  the right portion.  IWF and IWL index the first and last
-!  intersecting arcs.
-!
-  iwf = 1
-!
-!  Top of loop -- set N0 to N1 and NL->NR to the first edge.
-!  IWC points to the arc currently being processed.  LFT
-!  <= 0 iff N0 LEFT N1->N2.
-!
-10 continue
-
-  lft = 0
-  n0 = n1
-  x0 = x1
-  y0 = y1
-  z0 = z1
-  nl = iwk(1,iwf)
-  nr = iwk(2,iwf)
-  iwc = iwf
-!
-!  Set NEXT to the node opposite NL->NR unless IWC is the last arc.
-!
-11 continue
-
-  if (iwc == iwl) then
-    go to 21
-  end if
-
-  iwcp1 = iwc + 1
-  next = iwk(1,iwcp1)
-
-  if ( next /= nl ) then
-    go to 16
-  end if
-
-  next = iwk(2,iwcp1)
-!
-!  NEXT RIGHT N1->N2 and IWC < IWL.  Test for a possible swap.
-!
-  if ( .not. left ( x0, y0, z0, x(nr), y(nr), z(nr), x(next), &
-                  y(next), z(next) ) ) then
-    go to 14
-  end if
-
-  if ( 0 <= lft ) then
-    go to 12
-  end if
-
-  if ( .not. left ( x(nl), y(nl), z(nl), x0, y0, z0, x(next), &
-                  y(next), z(next) ) ) then
-    go to 14
-  end if
-!
-!  Replace NL->NR with N0->NEXT.
-!
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwc) = n0
-  iwk(2,iwc) = next
-  go to 15
-!
-!  Swap NL-NR for N0-NEXT, shift columns IWC+1,...,IWL to
-!  the left, and store N0-NEXT in the right portion of IWK.
-!
-12 continue
-
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-
-  do i = iwcp1, iwl
-    iwk(1,i-1) = iwk(1,i)
-    iwk(2,i-1) = iwk(2,i)
-  end do
-
-  iwk(1,iwl) = n0
-  iwk(2,iwl) = next
-  iwl = iwl - 1
-  nr = next
-  go to 11
-!
-!  A swap is not possible.  Set N0 to NR.
-!
-14 continue
-
-  n0 = nr
-  x0 = x(n0)
-  y0 = y(n0)
-  z0 = z(n0)
-  lft = 1
-!
-!  Advance to the next arc.
-!
-15 continue
-
-  nr = next
-  iwc = iwc + 1
-  go to 11
-!
-!  NEXT LEFT N1->N2, NEXT .NE. N2, and IWC < IWL.
-!  Test for a possible swap.
-!
-16 continue
-
-  if ( .not. &
-    left ( x(nl), y(nl), z(nl), x0, y0, z0, x(next), y(next), z(next) ) ) then
-    go to 19
-  end if
-
-  if ( lft <= 0 ) then
-    go to 17
-  end if
-
-  if ( .not. &
-    left ( x0, y0, z0, x(nr), y(nr), z(nr), x(next), y(next), z(next) ) ) then
-    go to 19
-  end if
-!
-!  Replace NL->NR with NEXT->N0.
-!
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwc) = next
-  iwk(2,iwc) = n0
-  go to 20
-!
-!  Swap NL-NR for N0-NEXT, shift columns IWF,...,IWC-1 to
-!  the right, and store N0-NEXT in the left portion of IWK.
-!
-17 continue
-
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-
-  do i = iwc-1, iwf, -1
-    iwk(1,i+1) = iwk(1,i)
-    iwk(2,i+1) = iwk(2,i)
-  end do
-
-  iwk(1,iwf) = n0
-  iwk(2,iwf) = next
-  iwf = iwf + 1
-  go to 20
-!
-!  A swap is not possible.  Set N0 to NL.
-!
-19 continue
-
-  n0 = nl
-  x0 = x(n0)
-  y0 = y(n0)
-  z0 = z(n0)
-  lft = -1
-!
-!  Advance to the next arc.
-!
-20 continue
-
-  nl = next
-  iwc = iwc + 1
-  go to 11
-!
-!  N2 is opposite NL->NR (IWC = IWL).
-!
-21 continue
-
-  if ( n0 == n1 ) then
-    go to 24
-  end if
-
-  if ( lft < 0 ) then
-    go to 22
-  end if
-!
-!  N0 RIGHT N1->N2.  Test for a possible swap.
-!
-  if ( .not. left ( x0, y0, z0, x(nr), y(nr), z(nr), x2, y2, z2 ) ) then
-    go to 10
-  end if
-!
-!  Swap NL-NR for N0-N2 and store N0-N2 in the right portion of IWK.
-!
-  call swap ( n2, n0, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwl) = n0
-  iwk(2,iwl) = n2
-  iwl = iwl - 1
-  go to 10
-!
-!  N0 LEFT N1->N2.  Test for a possible swap.
-!
-22 continue
-
-  if ( .not. left ( x(nl), y(nl), z(nl), x0, y0, z0, x2, y2, z2 ) ) then
-    go to 10
-  end if
-!
-!  Swap NL-NR for N0-N2, shift columns IWF,...,IWL-1 to the
-!  right, and store N0-N2 in the left portion of IWK.
-!
-  call swap ( n2, n0, nl, nr, list, lptr, lend, lp21 )
-  i = iwl
-
-  do
-
-    iwk(1,i) = iwk(1,i-1)
-    iwk(2,i) = iwk(2,i-1)
-    i = i - 1
-
-    if ( i <= iwf ) then
-      exit
-    end if
-
-  end do
-
-  iwk(1,iwf) = n0
-  iwk(2,iwf) = n2
-  iwf = iwf + 1
-  go to 10
-!
-!  IWF = IWC = IWL.  Swap out the last arc for N1-N2 and store zeros in IWK.
-!
-24 continue
-
-  call swap ( n2, n1, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwc) = 0
-  iwk(2,iwc) = 0
-!
-!  Optimization procedure.
-!
-!  Optimize the set of new arcs to the left of IN1->IN2.
-!
-  ier = 0
-
-  if ( 1 < iwc ) then
-
-    nit = 4 * ( iwc - 1 )
-
-    call optim ( x, y, z, iwc-1, list, lptr, lend, nit, iwk, ierr )
-
-    if ( ierr /= 0 .and. ierr /= 1 ) then
-      ier = 4
-      return
-    end if
-
-    if ( ierr == 1 ) then
-      ier = 5
-    end if
-
-  end if
-!
-!  Optimize the set of new arcs to the right of IN1->IN2.
-!
-  if ( iwc < iwend ) then
-
-    nit = 4 * ( iwend - iwc )
-
-    call optim ( x, y, z, iwend-iwc, list, lptr, lend, nit, iwk(1,iwc+1), ierr )
-
-    if ( ierr /= 0 .and. ierr /= 1) then
-      ier = 4
-      return
-    end if
-
-    if ( ierr == 1 ) then
-      ier = 5
-      return
-    end if
-
-  end if
-
-  if ( ier == 5 ) then
-    ier = 5
-    return
-  end if
-
-  return
-end
-subroutine getnp ( x, y, z, list, lptr, lend, l, npts, df, ier )
-
-!*****************************************************************************80
-!
-!! GETNP gets the next nearest node to a given node.
-!
-!  Discussion:
-!
-!    Given a Delaunay triangulation of N nodes on the unit
-!    sphere and an array NPTS containing the indexes of L-1
-!    nodes ordered by angular distance from NPTS(1), this 
-!    routine sets NPTS(L) to the index of the next node in the
-!    sequence -- the node, other than NPTS(1),...,NPTS(L-1),
-!    that is closest to NPTS(1).  Thus, the ordered sequence
-!    of K closest nodes to N1 (including N1) may be determined
-!    by K-1 calls to GETNP with NPTS(1) = N1 and L = 2,3,...,K
-!    for K >= 2.
-!
-!    The algorithm uses the property of a Delaunay triangula-
-!    tion that the K-th closest node to N1 is a neighbor of one
-!    of the K-1 closest nodes to N1.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the 
-!    triangulation data structure, created by TRMESH.
-!
-!    Input, integer ( kind = 4 ) L, the number of nodes in the sequence on 
-!    output.  2 <= L <= N.
-!
-!    Input/output, integer ( kind = 4 ) NPTS(L).  On input, the indexes of 
-!    the L-1 closest nodes to NPTS(1) in the first L-1 locations.  On output,
-!    updated with the index of the L-th closest node to NPTS(1) in 
-!    position L unless IER = 1.
-!
-!    Output, real ( kind = 8 ) DF, value of an increasing function (negative
-!    cosine) of the angular distance between NPTS(1) and NPTS(L) unless IER = 1.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if L < 2.
-!
-!  Local parameters:
-!
-!    DNB,DNP =  Negative cosines of the angular distances from
-!               N1 to NB and to NP, respectively
-!    I =        NPTS index and DO-loop index
-!    LM1 =      L-1
-!    LP =       LIST pointer of a neighbor of NI
-!    LPL =      Pointer to the last neighbor of NI
-!    N1 =       NPTS(1)
-!    NB =       Neighbor of NI and candidate for NP
-!    NI =       NPTS(I)
-!    NP =       Candidate for NPTS(L)
-!    X1,Y1,Z1 = Coordinates of N1
-!
-  implicit none
-
-  integer ( kind = 4 ) l
-
-  real    ( kind = 8 ) df
-  real    ( kind = 8 ) dnb
-  real    ( kind = 8 ) dnp
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) ni
-  integer ( kind = 4 ) np
-  integer ( kind = 4 ) npts(l)
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z1
-
-  if ( l < 2 ) then
-    ier = 1
-    return
-  end if
-
-  ier = 0
-!
-!  Store N1 = NPTS(1) and mark the elements of NPTS.
-!
-  n1 = npts(1)
-  x1 = x(n1)
-  y1 = y(n1)
-  z1 = z(n1)
-
-  do i = 1, l-1
-    ni = npts(i)
-    lend(ni) = -lend(ni)
-  end do
-!
-!  Candidates for NP = NPTS(L) are the unmarked neighbors
-!  of nodes in NPTS.  DNP is initially greater than -cos(PI)
-!  (the maximum distance).
-!
-  dnp = 2.0D+00
-!
-!  Loop on nodes NI in NPTS.
-!
-  do i = 1, l-1
-
-    ni = npts(i)
-    lpl = -lend(ni)
-    lp = lpl
-!
-!  Loop on neighbors NB of NI.
-!
-    do
-
-      nb = abs ( list(lp) )
-!
-!  NB is an unmarked neighbor of NI.  Replace NP if NB is closer to N1.
-!
-      if ( 0 <= lend(nb) ) then
-        dnb = - ( x(nb) * x1 + y(nb) * y1 + z(nb) * z1 )
-        if ( dnb < dnp ) then
-          np = nb
-          dnp = dnb
-        end if
-      end if
-
-      lp = lptr(lp)
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-
-  npts(l) = np
-  df = dnp
-!
-!  Unmark the elements of NPTS.
-!
-  do i = 1, l-1
-    ni = npts(i)
-    lend(ni) = -lend(ni)
-  end do
-
-  return
-end
-subroutine i4_swap ( i, j )
-
-!*****************************************************************************80
-!
-!! I4_SWAP swaps two integer values.
-!
-!  Modified:
-!
-!    30 November 1998
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input/output, integer ( kind = 4 ) I, J.  On output, the values of I and
-!    J have been interchanged.
-!
-  implicit none
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) k
-
-  k = i
-  i = j
-  j = k
-
-  return
-end
-subroutine insert ( k, lp, list, lptr, lnew )
-
-!*****************************************************************************80
-!
-!! INSERT inserts K as a neighbor of N1.
-!
-!  Discussion:
-!
-!    This subroutine inserts K as a neighbor of N1 following
-!    N2, where LP is the LIST pointer of N2 as a neighbor of
-!    N1.  Note that, if N2 is the last neighbor of N1, K will
-!    become the first neighbor (even if N1 is a boundary node).
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) K, the index of the node to be inserted.
-!
-!    Input, integer ( kind = 4 ) LP, the LIST pointer of N2 as a neighbor of N1.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LNEW, 
-!    the data structure defining the triangulation, created by TRMESH.
-!    On output, updated with the addition of node K.
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lsav
-
-  lsav = lptr(lp)
-  lptr(lp) = lnew
-  list(lnew) = k
-  lptr(lnew) = lsav
-  lnew = lnew + 1
-
-  return
-end
-function inside ( p, lv, xv, yv, zv, nv, listv, ier )
-
-!*****************************************************************************80
-!
-!! INSIDE determines if a point is inside a polygonal region.
-!
-!  Discussion:
-!
-!    This function locates a point P relative to a polygonal
-!    region R on the surface of the unit sphere, returning
-!    INSIDE = TRUE if and only if P is contained in R.  R is
-!    defined by a cyclically ordered sequence of vertices which
-!    form a positively-oriented simple closed curve.  Adjacent
-!    vertices need not be distinct but the curve must not be
-!    self-intersecting.  Also, while polygon edges are by definition
-!    restricted to a single hemisphere, R is not so
-!    restricted.  Its interior is the region to the left as the
-!    vertices are traversed in order.
-!
-!    The algorithm consists of selecting a point Q in R and
-!    then finding all points at which the great circle defined
-!    by P and Q intersects the boundary of R.  P lies inside R
-!    if and only if there is an even number of intersection
-!    points between Q and P.  Q is taken to be a point immediately
-!    to the left of a directed boundary edge -- the first
-!    one that results in no consistency-check failures.
-!
-!    If P is close to the polygon boundary, the problem is
-!    ill-conditioned and the decision may be incorrect.  Also,
-!    an incorrect decision may result from a poor choice of Q
-!    (if, for example, a boundary edge lies on the great circle
-!    defined by P and Q).  A more reliable result could be
-!    obtained by a sequence of calls to INSIDE with the vertices
-!    cyclically permuted before each call (to alter the
-!    choice of Q).
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) P(3), the coordinates of the point (unit vector)
-!    to be located.
-!
-!    Input, integer ( kind = 4 ) LV, the length of arrays XV, YV, and ZV.
-!
-!    Input, real ( kind = 8 ) XV(LV), YV(LV), ZV(LV), the coordinates of unit
-!    vectors (points on the unit sphere).  
-!
-!    Input, integer ( kind = 4 ) NV, the number of vertices in the polygon. 
-!    3 <= NV <= LV.
-!
-!    Input, integer ( kind = 4 ) LISTV(NV), the indexes (for XV, YV, and ZV) 
-!    of a cyclically-ordered (and CCW-ordered) sequence of vertices that
-!    define R.  The last vertex (indexed by LISTV(NV)) is followed by the 
-!    first (indexed by LISTV(1)).  LISTV entries must be in the range 1 to LV.
-!
-!    Output, logical INSIDE, TRUE if and only if P lies inside R unless
-!    IER /= 0, in which case the value is not altered.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if LV or NV is outside its valid range.
-!    2, if a LISTV entry is outside its valid range.
-!    3, if the polygon boundary was found to be self-intersecting.  This 
-!      error will not necessarily be detected.
-!    4, if every choice of Q (one for each boundary edge) led to failure of 
-!      some internal consistency check.  The most likely cause of this error 
-!      is invalid input:  P = (0,0,0), a null or self-intersecting polygon, etc.
-!
-!  Local parameters:
-!
-!    B =         Intersection point between the boundary and
-!                the great circle defined by P and Q.
-!
-!    BP,BQ =     <B,P> and <B,Q>, respectively, maximized over
-!                intersection points B that lie between P and
-!                Q (on the shorter arc) -- used to find the
-!                closest intersection points to P and Q
-!    CN =        Q X P = normal to the plane of P and Q
-!    D =         Dot product <B,P> or <B,Q>
-!    EPS =       Parameter used to define Q as the point whose
-!                orthogonal distance to (the midpoint of)
-!                boundary edge V1->V2 is approximately EPS/
-!                (2*Cos(A/2)), where <V1,V2> = Cos(A).
-!    EVEN =      TRUE iff an even number of intersection points
-!                lie between P and Q (on the shorter arc)
-!    I1,I2 =     Indexes (LISTV elements) of a pair of adjacent
-!                boundary vertices (endpoints of a boundary
-!                edge)
-!    IERR =      Error flag for calls to INTRSC (not tested)
-!    IMX =       Local copy of LV and maximum value of I1 and I2
-!    K =         DO-loop index and LISTV index
-!    K0 =        LISTV index of the first endpoint of the
-!                boundary edge used to compute Q
-!    LFT1,LFT2 = Logical variables associated with I1 and I2 in
-!                the boundary traversal:  TRUE iff the vertex
-!                is strictly to the left of Q->P (<V,CN> > 0)
-!    N =         Local copy of NV
-!    NI =        Number of intersections (between the boundary
-!                curve and the great circle P-Q) encountered
-!    PINR =      TRUE iff P is to the left of the directed
-!                boundary edge associated with the closest
-!                intersection point to P that lies between P
-!                and Q (a left-to-right intersection as
-!                viewed from Q), or there is no intersection
-!                between P and Q (on the shorter arc)
-!    PN,QN =     P X CN and CN X Q, respectively:  used to
-!                locate intersections B relative to arc Q->P
-!    Q =         (V1 + V2 + EPS*VN/VNRM)/QNRM, where V1->V2 is
-!                the boundary edge indexed by LISTV(K0) ->
-!                LISTV(K0+1)
-!    QINR =      TRUE iff Q is to the left of the directed
-!                boundary edge associated with the closest
-!                intersection point to Q that lies between P
-!                and Q (a right-to-left intersection as
-!                viewed from Q), or there is no intersection
-!                between P and Q (on the shorter arc)
-!    QNRM =      Euclidean norm of V1+V2+EPS*VN/VNRM used to
-!                compute (normalize) Q
-!    V1,V2 =     Vertices indexed by I1 and I2 in the boundary
-!                traversal
-!    VN =        V1 X V2, where V1->V2 is the boundary edge
-!                indexed by LISTV(K0) -> LISTV(K0+1)
-!    VNRM =      Euclidean norm of VN
-!
-  implicit none
-
-  integer ( kind = 4 ) lv
-  integer ( kind = 4 ) nv
-
-  real    ( kind = 8 ) b(3)
-  real    ( kind = 8 ) bp
-  real    ( kind = 8 ) bq
-  real    ( kind = 8 ) cn(3)
-  real    ( kind = 8 ) d
-  real    ( kind = 8 ), parameter :: eps = 0.001D+00
-  logical even
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) imx
-  logical inside
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) k0
-  logical lft1
-  logical lft2
-  integer ( kind = 4 ) listv(nv)
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) ni
-  real    ( kind = 8 ) p(3)
-  logical pinr
-  real    ( kind = 8 ) pn(3)
-  real    ( kind = 8 ) q(3)
-  logical qinr
-  real    ( kind = 8 ) qn(3)
-  real    ( kind = 8 ) qnrm
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) vn(3)
-  real    ( kind = 8 ) vnrm
-  real    ( kind = 8 ) xv(lv)
-  real    ( kind = 8 ) yv(lv)
-  real    ( kind = 8 ) zv(lv)
-!
-!  Store local parameters.
-!
-  imx = lv
-  n = nv
-!
-!  Test for error 1.
-!
-  if ( n < 3 .or. imx < n ) then
-    ier = 1
-    return
-  end if
-!
-!  Initialize K0.
-!
-  k0 = 0
-  i1 = listv(1)
-
-  if ( i1 < 1 .or. imx < i1 ) then
-    ier = 2
-    return
-  end if
-!
-!  Increment K0 and set Q to a point immediately to the left
-!  of the midpoint of edge V1->V2 = LISTV(K0)->LISTV(K0+1):
-!  Q = (V1 + V2 + EPS*VN/VNRM)/QNRM, where VN = V1 X V2.
-!
-1 continue
-
-  k0 = k0 + 1
-
-  if ( n < k0 ) then
-    ier = 4
-    return
-  end if
-
-  i1 = listv(k0)
-
-  if ( k0 < n ) then
-    i2 = listv(k0+1)
-  else
-    i2 = listv(1)
-  end if
-
-  if ( i2 < 1 .or. imx < i2 ) then
-    ier = 2
-    return
-  end if
-
-  vn(1) = yv(i1) * zv(i2) - zv(i1) * yv(i2)
-  vn(2) = zv(i1) * xv(i2) - xv(i1) * zv(i2)
-  vn(3) = xv(i1) * yv(i2) - yv(i1) * xv(i2)
-  vnrm = sqrt ( sum ( vn(1:3)**2 ) )
-
-  if ( vnrm == 0.0D+00 ) then
-    go to 1
-  end if
-
-  q(1) = xv(i1) + xv(i2) + eps * vn(1) / vnrm
-  q(2) = yv(i1) + yv(i2) + eps * vn(2) / vnrm
-  q(3) = zv(i1) + zv(i2) + eps * vn(3) / vnrm
-
-  qnrm = sqrt ( sum ( q(1:3)**2 ) )
-
-  q(1) = q(1) / qnrm
-  q(2) = q(2) / qnrm
-  q(3) = q(3) / qnrm
-!
-!  Compute CN = Q X P, PN = P X CN, and QN = CN X Q.
-!
-  cn(1) = q(2) * p(3) - q(3) * p(2)
-  cn(2) = q(3) * p(1) - q(1) * p(3)
-  cn(3) = q(1) * p(2) - q(2) * p(1)
-
-  if ( cn(1) == 0.0D+00 .and. cn(2) == 0.0D+00  .and. cn(3) == 0.0D+00 ) then
-    go to 1
-  end if
-
-  pn(1) = p(2) * cn(3) - p(3) * cn(2)
-  pn(2) = p(3) * cn(1) - p(1) * cn(3)
-  pn(3) = p(1) * cn(2) - p(2) * cn(1)
-  qn(1) = cn(2) * q(3) - cn(3) * q(2)
-  qn(2) = cn(3) * q(1) - cn(1) * q(3)
-  qn(3) = cn(1) * q(2) - cn(2) * q(1)
-!
-!  Initialize parameters for the boundary traversal.
-!
-  ni = 0
-  even = .true.
-  bp = -2.0D+00
-  bq = -2.0D+00
-  pinr = .true.
-  qinr = .true.
-  i2 = listv(n)
-
-  if ( i2 < 1 .or. imx < i2 ) then
-    ier = 2
-    return
-  end if
-
-  lft2 = 0.0D+00 < cn(1) * xv(i2) + cn(2) * yv(i2) + cn(3) * zv(i2) 
-!
-!  Loop on boundary arcs I1->I2.
-!
-  do k = 1, n
-
-    i1 = i2
-    lft1 = lft2
-    i2 = listv(k)
-
-    if ( i2 < 1 .or. imx < i2 ) then
-      ier = 2
-      return
-    end if
-
-    lft2 = ( 0.0D+00 < cn(1) * xv(i2) + cn(2) * yv(i2) + cn(3) * zv(i2) )
-
-    if ( lft1 .eqv. lft2 ) then
-      cycle
-    end if
-!
-!  I1 and I2 are on opposite sides of Q->P.  Compute the
-!  point of intersection B.
-!
-    ni = ni + 1
-    v1(1) = xv(i1)
-    v1(2) = yv(i1)
-    v1(3) = zv(i1)
-    v2(1) = xv(i2)
-    v2(2) = yv(i2)
-    v2(3) = zv(i2)
-
-    call intrsc ( v1, v2, cn, b, ierr )
-!
-!  B is between Q and P (on the shorter arc) iff
-!  B Forward Q->P and B Forward P->Q       iff
-!  <B,QN> > 0 and 0 < <B,PN>.
-!
-    if ( 0.0D+00 < dot_product ( b(1:3), qn(1:3) ) .and. &
-         0.0D+00 < dot_product ( b(1:3), pn(1:3) ) ) then
-!
-!  Update EVEN, BQ, QINR, BP, and PINR.
-!
-      even = .not. even
-      d = dot_product ( b(1:3), q(1:3) )
-
-      if ( bq < d ) then
-        bq = d
-        qinr = lft2
-      end if
-
-      d = dot_product ( b(1:3), p(1:3) )
-
-      if ( bp < d ) then
-        bp = d
-        pinr = lft1
-      end if
-
-    end if
-
-  end do
-!
-!  Test for consistency:  NI must be even and QINR must be TRUE.
-!
-  if ( ni /= 2 * ( ni / 2 ) .or. .not. qinr ) then
-    go to 1
-  end if
-!
-!  Test for error 3:  different values of PINR and EVEN.
-!
-  if ( pinr .neqv. even ) then
-    ier = 3
-    return
-  end if
-
-  ier = 0
-  inside = even
-
-  return
-end
-subroutine intadd ( kk, i1, i2, i3, list, lptr, lend, lnew )
-
-!*****************************************************************************80
-!
-!! INTADD adds an interior node to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine adds an interior node to a triangulation
-!    of a set of points on the unit sphere.  The data structure
-!    is updated with the insertion of node KK into the triangle
-!    whose vertices are I1, I2, and I3.  No optimization of the
-!    triangulation is performed.
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) KK, the index of the node to be inserted. 
-!    1 <= KK and KK must not be equal to I1, I2, or I3.
-!
-!    Input, integer ( kind = 4 ) I1, I2, I3, indexes of the 
-!    counterclockwise-ordered sequence of vertices of a triangle which contains 
-!    node KK.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), LNEW, 
-!    the data structure defining the triangulation, created by TRMESH.  Triangle
-!    (I1,I2,I3) must be included in the triangulation.
-!    On output, updated with the addition of node KK.  KK
-!    will be connected to nodes I1, I2, and I3.
-!
-!  Local parameters:
-!
-!    K =        Local copy of KK
-!    LP =       LIST pointer
-!    N1,N2,N3 = Local copies of I1, I2, and I3
-!
-  implicit none
-
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-
-  k = kk
-!
-!  Initialization.
-!
-  n1 = i1
-  n2 = i2
-  n3 = i3
-!
-!  Add K as a neighbor of I1, I2, and I3.
-!
-  lp = lstptr ( lend(n1), n2, list, lptr )
-  call insert ( k, lp, list, lptr, lnew )
-
-  lp = lstptr ( lend(n2), n3, list, lptr )
-  call insert ( k, lp, list, lptr, lnew )
-
-  lp = lstptr ( lend(n3), n1, list, lptr )
-  call insert ( k, lp, list, lptr, lnew )
-!
-!  Add I1, I2, and I3 as neighbors of K.
-!
-  list(lnew) = n1
-  list(lnew+1) = n2
-  list(lnew+2) = n3
-  lptr(lnew) = lnew + 1
-  lptr(lnew+1) = lnew + 2
-  lptr(lnew+2) = lnew
-  lend(k) = lnew + 2
-  lnew = lnew + 3
-
-  return
-end
-subroutine intrsc ( p1, p2, cn, p, ier )
-
-!*****************************************************************************80
-!
-!! INTSRC finds the intersection of two great circles.
-!
-!  Discussion:
-!
-!    Given a great circle C and points P1 and P2 defining an
-!    arc A on the surface of the unit sphere, where A is the
-!    shorter of the two portions of the great circle C12
-!    associated with P1 and P2, this subroutine returns the point
-!    of intersection P between C and C12 that is closer to A.
-!    Thus, if P1 and P2 lie in opposite hemispheres defined by
-!    C, P is the point of intersection of C with A.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) P1(3), P2(3), the coordinates of unit vectors.
-!
-!    Input, real ( kind = 8 ) CN(3), the coordinates of a nonzero vector 
-!    which defines C as the intersection of the plane whose normal is CN 
-!    with the unit sphere.  Thus, if C is to be the great circle defined
-!    by P and Q, CN should be P X Q.
-!
-!    Output, real ( kind = 8 ) P(3), point of intersection defined above 
-!    unless IER is not 0, in which case P is not altered.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator.
-!    0, if no errors were encountered.
-!    1, if <CN,P1> = <CN,P2>.  This occurs iff P1 = P2 or CN = 0 or there are
-!      two intersection points at the same distance from A.
-!    2, if P2 = -P1 and the definition of A is therefore ambiguous.
-!
-!  Local parameters:
-!
-!    D1 =  <CN,P1>
-!    D2 =  <CN,P2>
-!    I =   DO-loop index
-!    PP =  P1 + T*(P2-P1) = Parametric representation of the
-!          line defined by P1 and P2
-!    PPN = Norm of PP
-!    T =   D1/(D1-D2) = Parameter value chosen so that PP lies
-!          in the plane of C
-!
-  implicit none
-
-  real    ( kind = 8 ) cn(3)
-  real    ( kind = 8 ) d1
-  real    ( kind = 8 ) d2
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  real    ( kind = 8 ) p(3)
-  real    ( kind = 8 ) p1(3)
-  real    ( kind = 8 ) p2(3)
-  real    ( kind = 8 ) pp(3)
-  real    ( kind = 8 ) ppn
-  real    ( kind = 8 ) t
-
-  d1 = dot_product ( cn(1:3), p1(1:3) )
-  d2 = dot_product ( cn(1:3), p2(1:3) )
-
-  if ( d1 == d2 ) then
-    ier = 1
-    return
-  end if
-!
-!  Solve for T such that <PP,CN> = 0 and compute PP and PPN.
-!
-  t = d1 / ( d1 - d2 )
-
-  pp(1:3) = p1(1:3) + t * ( p2(1:3) - p1(1:3) )
-
-  ppn = dot_product ( pp(1:3), pp(1:3) )
-!
-!  PPN = 0 iff PP = 0 iff P2 = -P1 (and T = .5).
-!
-  if ( ppn == 0.0D+00 ) then
-    ier = 2
-    return
-  end if
-
-  ppn = sqrt ( ppn )
-!
-!  Compute P = PP/PPN.
-!
-  p(1:3) = pp(1:3) / ppn
-
-  ier = 0
-
-  return
-end
-function jrand ( n, ix, iy, iz )
-
-!*****************************************************************************80
-!
-!! JRAND returns a random integer between 1 and N.
-!
-!  Discussion:
-!
-!   This function returns a uniformly distributed pseudorandom integer 
-!   in the range 1 to N.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:  
-!
-!    Brian Wichmann, David Hill, 
-!    An Efficient and Portable Pseudo-random Number Generator,
-!    Applied Statistics, 
-!    Volume 31, Number 2, 1982, pages 188-190.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the maximum value to be returned.
-!
-!    Input/output, integer ( kind = 4 ) IX, IY, IZ = seeds initialized to 
-!    values in the range 1 to 30,000 before the first call to JRAND, and 
-!    not altered between subsequent calls (unless a sequence of random 
-!    numbers is to be repeated by reinitializing the seeds).
-!
-!    Output, integer ( kind = 4 ) JRAND, a random integer in the range 1 to N.
-!
-!  Local parameters:
-!
-!    U = Pseudo-random number uniformly distributed in the interval (0,1).
-!    X = Pseudo-random number in the range 0 to 3 whose fractional part is U.
-!
-  implicit none
-
-  integer ( kind = 4 ) ix
-  integer ( kind = 4 ) iy
-  integer ( kind = 4 ) iz
-  integer ( kind = 4 ) jrand
-  integer ( kind = 4 ) n
-  real    ( kind = 8 ) u
-  real    ( kind = 8 ) x
-
-  ix = mod ( 171 * ix, 30269 )
-  iy = mod ( 172 * iy, 30307 )
-  iz = mod ( 170 * iz, 30323 )
-
-  x = ( real ( ix, kind = 8 ) / 30269.0D+00 ) &
-    + ( real ( iy, kind = 8 ) / 30307.0D+00 ) &
-    + ( real ( iz, kind = 8 ) / 30323.0D+00 )
-
-  u = x - int ( x )
-  jrand = real ( n, kind = 8 ) * u + 1.0D+00
-
-  return
-end
-function left ( x1, y1, z1, x2, y2, z2, x0, y0, z0 )
-
-!*****************************************************************************80
-!
-!! LEFT determines whether a node is to the left of a plane through the origin.
-!
-!  Discussion:
-!
-!    This function determines whether node N0 is in the
-!    (closed) left hemisphere defined by the plane containing
-!    N1, N2, and the origin, where left is defined relative to
-!    an observer at N1 facing N2.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X1, Y1, Z1 = Coordinates of N1.
-!
-!    Input, real ( kind = 8 ) X2, Y2, Z2 = Coordinates of N2.
-!
-!    Input, real ( kind = 8 ) X0, Y0, Z0 = Coordinates of N0.
-!
-!    Output, logical LEFT = TRUE if and only if N0 is in the closed
-!    left hemisphere.
-!
-  implicit none
-
-  logical left
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-!
-!  LEFT = TRUE iff <N0,N1 X N2> = det(N0,N1,N2) >= 0.
-!
-  left = x0 * ( y1 * z2 - y2 * z1 ) &
-       - y0 * ( x1 * z2 - x2 * z1 ) &
-       + z0 * ( x1 * y2 - x2 * y1 ) >= 0.0D+00
-
-  return
-end
-function lstptr ( lpl, nb, list, lptr )
-
-!*****************************************************************************80
-!
-!! LSTPTR returns the index of NB in the adjacency list.
-!
-!  Discussion:
-!
-!    This function returns the index (LIST pointer) of NB in
-!    the adjacency list for N0, where LPL = LEND(N0).
-!
-!    This function is identical to the similarly named function in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LPL, is LEND(N0).
-!
-!    Input, integer ( kind = 4 ) NB, index of the node whose pointer is to 
-!    be returned.  NB must be connected to N0.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), the data 
-!    structure defining the triangulation, created by TRMESH.
-!
-!    Output, integer ( kind = 4 ) LSTPTR, pointer such that LIST(LSTPTR) = NB or
-!    LIST(LSTPTR) = -NB, unless NB is not a neighbor of N0, in which 
-!    case LSTPTR = LPL.
-!
-!  Local parameters:
-!
-!    LP = LIST pointer
-!    ND = Nodal index
-!
-  implicit none
-
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nd
-
-  lp = lptr(lpl)
-
-  do
-
-    nd = list(lp)
-
-    if ( nd == nb ) then
-      exit
-    end if
-
-    lp = lptr(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-  end do
-
-  lstptr = lp
-
-  return
-end
-function nbcnt ( lpl, lptr )
-
-!*****************************************************************************80
-!
-!! NBCNT returns the number of neighbors of a node.
-!
-!  Discussion:
-!
-!    This function returns the number of neighbors of a node
-!    N0 in a triangulation created by TRMESH.
-!
-!    The number of neighbors also gives the order of the Voronoi
-!    polygon containing the point.  Thus, a neighbor count of 6
-!    means the node is contained in a 6-sided Voronoi region.
-!
-!    This function is identical to the similarly named function in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LPL = LIST pointer to the last neighbor of N0;
-!    LPL = LEND(N0).
-!
-!    Input, integer ( kind = 4 ) LPTR(6*(N-2)), pointers associated with LIST.
-!
-!    Output, integer ( kind = 4 ) NBCNT, the number of neighbors of N0.
-!
-!  Local parameters:
-!
-!    K =  Counter for computing the number of neighbors.
-!
-!    LP = LIST pointer
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) nbcnt
-
-  lp = lpl
-  k = 1
-
-  do
-
-    lp = lptr(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-    k = k + 1
-
-  end do
-
-  nbcnt = k
-
-  return
-end
-function nearnd ( p, ist, n, x, y, z, list, lptr, lend, al )
-
-!*****************************************************************************80
-!
-!! NEARND returns the nearest node to a given point.
-!
-!  Discussion:
-!
-!    Given a point P on the surface of the unit sphere and a
-!    Delaunay triangulation created by TRMESH, this
-!    function returns the index of the nearest triangulation
-!    node to P.
-!
-!    The algorithm consists of implicitly adding P to the
-!    triangulation, finding the nearest neighbor to P, and
-!    implicitly deleting P from the triangulation.  Thus, it
-!    is based on the fact that, if P is a node in a Delaunay
-!    triangulation, the nearest node to P is a neighbor of P.
-!
-!    For large values of N, this procedure will be faster than
-!    the naive approach of computing the distance from P to every node.
-!
-!    Note that the number of candidates for NEARND (neighbors of P) 
-!    is limited to LMAX defined in the PARAMETER statement below.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) P(3), the Cartesian coordinates of the point P to 
-!    be located relative to the triangulation.  It is assumed 
-!    that P(1)**2 + P(2)**2 + P(3)**2 = 1, that is, that the
-!    point lies on the unit sphere.
-!
-!    Input, integer ( kind = 4 ) IST, the index of the node at which the search
-!    is to begin.  The search time depends on the proximity of this 
-!    node to P.  If no good candidate is known, any value between
-!    1 and N will do.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    N must be at least 3.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the Cartesian coordinates of
-!    the nodes.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), 
-!    the data structure defining the triangulation, created by TRMESH.
-!
-!    Output, real ( kind = 8 ) AL, the arc length between P and node NEARND.
-!    Because both points are on the unit sphere, this is also
-!    the angular separation in radians.
-!
-!    Output, integer ( kind = 4 ) NEARND, the index of the nearest node to P.
-!    NEARND will be 0 if N < 3 or the triangulation data structure 
-!    is invalid.
-!
-!  Local parameters:
-!
-!    B1,B2,B3 =  Unnormalized barycentric coordinates returned by TRFIND
-!    DS1 =       (Negative cosine of the) distance from P to N1
-!    DSR =       (Negative cosine of the) distance from P to NR
-!    DX1,..DZ3 = Components of vectors used by the swap test
-!    I1,I2,I3 =  Nodal indexes of a triangle containing P, or
-!                the rightmost (I1) and leftmost (I2) visible
-!                boundary nodes as viewed from P
-!    L =         Length of LISTP/LPTRP and number of neighbors of P
-!    LMAX =      Maximum value of L
-!    LISTP =     Indexes of the neighbors of P
-!    LPTRP =     Array of pointers in 1-1 correspondence with LISTP elements
-!    LP =        LIST pointer to a neighbor of N1 and LISTP pointer
-!    LP1,LP2 =   LISTP indexes (pointers)
-!    LPL =       Pointer to the last neighbor of N1
-!    N1 =        Index of a node visible from P
-!    N2 =        Index of an endpoint of an arc opposite P
-!    N3 =        Index of the node opposite N1->N2
-!    NN =        Local copy of N
-!    NR =        Index of a candidate for the nearest node to P
-!    NST =       Index of the node at which TRFIND begins the search
-!
-  implicit none
-
-  integer ( kind = 4 ), parameter :: lmax = 25
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) al
-  real    ( kind = 8 ) b1
-  real    ( kind = 8 ) b2
-  real    ( kind = 8 ) b3
-  real    ( kind = 8 ) ds1
-  real    ( kind = 8 ) dsr
-  real    ( kind = 8 ) dx1
-  real    ( kind = 8 ) dx2
-  real    ( kind = 8 ) dx3
-  real    ( kind = 8 ) dy1
-  real    ( kind = 8 ) dy2
-  real    ( kind = 8 ) dy3
-  real    ( kind = 8 ) dz1
-  real    ( kind = 8 ) dz2
-  real    ( kind = 8 ) dz3
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ist
-  integer ( kind = 4 ) l
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) listp(lmax)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp1
-  integer ( kind = 4 ) lp2
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lptrp(lmax)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) nearnd
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nr
-  integer ( kind = 4 ) nst
-  real    ( kind = 8 ) p(3)
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nearnd = 0
-  al = 0.0D+00
-!
-!  Store local parameters and test for N invalid.
-!
-  nn = n
-
-  if ( nn < 3 ) then
-    return
-  end if
-
-  nst = ist
-
-  if ( nst < 1 .or. nn < nst ) then
-    nst = 1
-  end if
-!
-!  Find a triangle (I1,I2,I3) containing P, or the rightmost
-!  (I1) and leftmost (I2) visible boundary nodes as viewed from P.
-!
-  call trfind ( nst, p, n, x, y, z, list, lptr, lend, b1, b2, b3, i1, i2, i3 )
-!
-!  Test for collinear nodes.
-!
-  if ( i1 == 0 ) then
-    return
-  end if
-!
-!  Store the linked list of 'neighbors' of P in LISTP and
-!  LPTRP.  I1 is the first neighbor, and 0 is stored as
-!  the last neighbor if P is not contained in a triangle.
-!  L is the length of LISTP and LPTRP, and is limited to
-!  LMAX.
-!
-  if ( i3 /= 0 ) then
-
-    listp(1) = i1
-    lptrp(1) = 2
-    listp(2) = i2
-    lptrp(2) = 3
-    listp(3) = i3
-    lptrp(3) = 1
-    l = 3
-
-  else
-
-    n1 = i1
-    l = 1
-    lp1 = 2
-    listp(l) = n1
-    lptrp(l) = lp1
-!
-!  Loop on the ordered sequence of visible boundary nodes
-!  N1 from I1 to I2.
-!
-    do
-
-      lpl = lend(n1)
-      n1 = -list(lpl)
-      l = lp1
-      lp1 = l+1
-      listp(l) = n1
-      lptrp(l) = lp1
-
-      if ( n1 == i2 .or. lmax <= lp1 ) then
-        exit
-      end if
-
-    end do
-
-    l = lp1
-    listp(l) = 0
-    lptrp(l) = 1
-
-  end if
-!
-!  Initialize variables for a loop on arcs N1-N2 opposite P
-!  in which new 'neighbors' are 'swapped' in.  N1 follows
-!  N2 as a neighbor of P, and LP1 and LP2 are the LISTP
-!  indexes of N1 and N2.
-!
-  lp2 = 1
-  n2 = i1
-  lp1 = lptrp(1)
-  n1 = listp(lp1)
-!
-!  Begin loop:  find the node N3 opposite N1->N2.
-!
-  do
-
-    lp = lstptr ( lend(n1), n2, list, lptr )
-
-    if ( 0 <= list(lp) ) then
-
-      lp = lptr(lp)
-      n3 = abs ( list(lp) )
-!
-!  Swap test:  Exit the loop if L = LMAX.
-!
-      if ( l == lmax ) then
-        exit
-      end if
-
-      dx1 = x(n1) - p(1)
-      dy1 = y(n1) - p(2)
-      dz1 = z(n1) - p(3)
-
-      dx2 = x(n2) - p(1)
-      dy2 = y(n2) - p(2)
-      dz2 = z(n2) - p(3)
-
-      dx3 = x(n3) - p(1)
-      dy3 = y(n3) - p(2)
-      dz3 = z(n3) - p(3)
-!
-!  Swap:  Insert N3 following N2 in the adjacency list for P.
-!  The two new arcs opposite P must be tested.
-!
-      if ( dx3 * ( dy2 * dz1 - dy1 * dz2 ) - &
-           dy3 * ( dx2 * dz1 - dx1 * dz2 ) + &
-           dz3 * ( dx2 * dy1 - dx1 * dy2 ) > 0.0D+00 ) then
-
-        l = l+1
-        lptrp(lp2) = l
-        listp(l) = n3
-        lptrp(l) = lp1
-        lp1 = l
-        n1 = n3
-        cycle
-
-      end if
-
-    end if
-!
-!  No swap:  Advance to the next arc and test for termination
-!  on N1 = I1 (LP1 = 1) or N1 followed by 0.
-!
-    if ( lp1 == 1 ) then
-      exit
-    end if
-
-    lp2 = lp1
-    n2 = n1
-    lp1 = lptrp(lp1)
-    n1 = listp(lp1)
-
-    if ( n1 == 0 ) then
-      exit
-    end if
-
-  end do
-!
-!  Set NR and DSR to the index of the nearest node to P and
-!  an increasing function (negative cosine) of its distance
-!  from P, respectively.
-!
-  nr = i1
-  dsr = -( x(nr) * p(1) + y(nr) * p(2) + z(nr) * p(3) )
-
-  do lp = 2, l
-
-    n1 = listp(lp)
-
-    if ( n1 == 0 ) then
-      cycle
-    end if
-
-    ds1 = -( x(n1) * p(1) + y(n1) * p(2) + z(n1) * p(3) )
-
-    if ( ds1 < dsr ) then
-      nr = n1
-      dsr = ds1
-    end if
-
-  end do
-
-  dsr = -dsr
-  dsr = min ( dsr, 1.0D+00 )
-
-  al = acos ( dsr )
-  nearnd = nr
-
-  return
-end
-subroutine optim ( x, y, z, na, list, lptr, lend, nit, iwk, ier )
-
-!*****************************************************************************80
-!
-!! OPTIM optimizes the quadrilateral portion of a triangulation.
-!
-!  Discussion:
-!
-!    Given a set of NA triangulation arcs, this subroutine
-!    optimizes the portion of the triangulation consisting of
-!    the quadrilaterals (pairs of adjacent triangles) which
-!    have the arcs as diagonals by applying the circumcircle
-!    test and appropriate swaps to the arcs.
-!
-!    An iteration consists of applying the swap test and
-!    swaps to all NA arcs in the order in which they are
-!    stored.  The iteration is repeated until no swap occurs
-!    or NIT iterations have been performed.  The bound on the
-!    number of iterations may be necessary to prevent an
-!    infinite loop caused by cycling (reversing the effect of a
-!    previous swap) due to floating point inaccuracy when four
-!    or more nodes are nearly cocircular.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X(*), Y(*), Z(*), the nodal coordinates.
-!
-!    Input, integer ( kind = 4 ) NA, the number of arcs in the set.  NA >= 0.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    the data structure defining the triangulation, created by TRMESH.
-!    On output, updated to reflect the swaps.
-!
-!    Input/output, integer ( kind = 4 ) NIT.  On input, the maximum number of
-!    iterations to be performed.  NIT = 4*NA should be sufficient.  NIT >= 1.
-!    On output, the number of iterations performed.
-!
-!    Input/output, integer ( kind = 4 ) IWK(2,NA), the nodal indexes of the arc
-!    endpoints (pairs of endpoints are stored in columns).  On output, endpoint 
-!    indexes of the new set of arcs reflecting the swaps.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if a swap occurred on the last of MAXIT iterations, where MAXIT is the
-!      value of NIT on input.  The new set of arcs is not necessarily optimal
-!      in this case.
-!    2, if NA < 0 or NIT < 1 on input.
-!    3, if IWK(2,I) is not a neighbor of IWK(1,I) for some I in the range 1
-!      to NA.  A swap may have occurred in this case.
-!    4, if a zero pointer was returned by subroutine SWAP.
-!
-!  Local parameters:
-!
-!    I =       Column index for IWK
-!    IO1,IO2 = Nodal indexes of the endpoints of an arc in IWK
-!    ITER =    Iteration count
-!    LP =      LIST pointer
-!    LP21 =    Parameter returned by SWAP (not used)
-!    LPL =     Pointer to the last neighbor of IO1
-!    LPP =     Pointer to the node preceding IO2 as a neighbor of IO1
-!    MAXIT =   Input value of NIT
-!    N1,N2 =   Nodes opposite IO1->IO2 and IO2->IO1, respectively
-!    NNA =     Local copy of NA
-!    SWP =     Flag set to TRUE iff a swap occurs in the optimization loop
-!
-  implicit none
-
-  integer ( kind = 4 ) na
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) iter
-  integer ( kind = 4 ) iwk(2,na)
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) maxit
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) nit
-  integer ( kind = 4 ) nna
-  logical swp
-  logical swptst
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) z(*)
-
-  nna = na
-  maxit = nit
-
-  if ( nna < 0 .or. maxit < 1 ) then
-    nit = 0
-    ier = 2
-    return
-  end if
-!
-!  Initialize iteration count ITER and test for NA = 0.
-!
-  iter = 0
-
-  if ( nna == 0 ) then
-    nit = 0
-    ier = 0
-    return
-  end if
-!
-!  Top of loop.
-!  SWP = TRUE iff a swap occurred in the current iteration.
-!
-  do
-
-    if ( maxit <= iter ) then
-      nit = iter
-      ier = 1
-      return
-    end if
-
-    iter = iter + 1
-    swp = .false.
-!
-!  Inner loop on arcs IO1-IO2.
-!
-    do i = 1, nna
-
-      io1 = iwk(1,i)
-      io2 = iwk(2,i)
-!
-!  Set N1 and N2 to the nodes opposite IO1->IO2 and
-!  IO2->IO1, respectively.  Determine the following:
-!
-!  LPL = pointer to the last neighbor of IO1,
-!  LP = pointer to IO2 as a neighbor of IO1, and
-!  LPP = pointer to the node N2 preceding IO2.
-!
-      lpl = lend(io1)
-      lpp = lpl
-      lp = lptr(lpp)
-
-      do
-
-        if ( list(lp) == io2 ) then
-          go to 3
-        end if
-
-        lpp = lp
-        lp = lptr(lpp)
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-!
-!  IO2 should be the last neighbor of IO1.  Test for no
-!  arc and bypass the swap test if IO1 is a boundary node.
-!
-      if ( abs ( list(lp) ) /= io2 ) then
-        nit = iter
-        ier = 3
-        return
-      end if
-
-      if ( list(lp) < 0 ) then
-        go to 4
-      end if
-!
-!  Store N1 and N2, or bypass the swap test if IO1 is a
-!  boundary node and IO2 is its first neighbor.
-!
-3     continue
-
-      n2 = list(lpp)
-!
-!  Test IO1-IO2 for a swap, and update IWK if necessary.
-!
-      if ( 0 <= n2 ) then
-
-        lp = lptr(lp)
-        n1 = abs ( list(lp) )
-
-        if ( swptst ( n1, n2, io1, io2, x, y, z ) ) then
-
-          call swap ( n1, n2, io1, io2, list, lptr, lend, lp21 )
-
-          if ( lp21 == 0 ) then
-            nit = iter
-            ier = 4
-            return
-          end if
-
-          swp = .true.
-          iwk(1,i) = n1
-          iwk(2,i) = n2
-
-        end if
-
-      end if
- 
-4     continue
-
-    end do
-
-    if ( .not. swp ) then
-      exit
-    end if
-
-  end do
-
-  nit = iter
-  ier = 0
-
-  return
-end
-subroutine r83vec_normalize ( n, x, y, z )
-
-!*****************************************************************************80
-!
-!! R83VEC_NORMALIZE normalizes each R83 in an R83VEC to have unit norm.
-!
-!  Modified:
-!
-!    25 June 2002
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of vectors.
-!
-!    Input/output, real ( kind = 8 ) X(N), Y(N), Z(N), the components of
-!    the vectors.
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  real    ( kind = 8 ) norm
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  do i = 1, n
-
-    norm = sqrt ( x(i)**2 + y(i)**2 + z(i)**2 )
-
-    if ( norm /= 0.0D+00 ) then
-      x(i) = x(i) / norm
-      y(i) = y(i) / norm
-      z(i) = z(i) / norm
-    end if
-
-  end do
-
-  return
-end
-subroutine scoord ( px, py, pz, plat, plon, pnrm )
-
-!*****************************************************************************80
-!
-!! SCOORD converts from Cartesian to spherical coordinates.
-!
-!  Discussion:
-!
-!    This subroutine converts a point P from Cartesian (X,Y,Z) coordinates 
-!    to spherical ( LATITUDE, LONGITUDE, RADIUS ) coordinates.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) PX, PY, PZ, the coordinates of P.
-!
-!    Output, real ( kind = 8 ) PLAT, the latitude of P in the range -PI/2 
-!    to PI/2, or 0 if PNRM = 0.
-!
-!    Output, real ( kind = 8 ) PLON, the longitude of P in the range -PI to PI,
-!    or 0 if P lies on the Z-axis.  
-!
-!    Output, real ( kind = 8 ) PNRM, the magnitude (Euclidean norm) of P.
-!
-  implicit none
-
-  real    ( kind = 8 ) plat
-  real    ( kind = 8 ) plon
-  real    ( kind = 8 ) pnrm
-  real    ( kind = 8 ) px
-  real    ( kind = 8 ) py
-  real    ( kind = 8 ) pz
-
-  pnrm = sqrt ( px * px + py * py + pz * pz )
-
-  if ( px /= 0.0D+00 .or. py /= 0.0D+00 ) then
-    plon = atan2 ( py, px )
-  else
-    plon = 0.0D+00
-  end if
-
-  if ( pnrm /= 0.0D+00 ) then
-    plat = asin ( pz / pnrm )
-  else
-    plat = 0.0D+00
-  end if
-
-  return
-end
-function store ( x )
-
-!*****************************************************************************80
-!
-!! STORE forces its argument to be stored.
-!
-!  Discussion:
-!
-!    This function forces its argument X to be stored in a
-!    memory location, thus providing a means of determining
-!    floating point number characteristics (such as the machine
-!    precision) when it is necessary to avoid computation in
-!    high precision registers.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X, the value to be stored.
-!
-!    Output, real ( kind = 8 ) STORE, the value of X after it has been stored
-!    and possibly truncated or rounded to the single precision word length.
-!
-  implicit none
-
-  real    ( kind = 8 ) store
-  real    ( kind = 8 ) x
-  real    ( kind = 8 ) y
-
-  common /stcom/ y
-
-  y = x
-  store = y
-
-  return
-end
-subroutine swap ( in1, in2, io1, io2, list, lptr, lend, lp21 )
-
-!*****************************************************************************80
-!
-!! SWAP replaces the diagonal arc of a quadrilateral with the other diagonal.
-!
-!  Discussion:
-!
-!    Given a triangulation of a set of points on the unit
-!    sphere, this subroutine replaces a diagonal arc in a
-!    strictly convex quadrilateral (defined by a pair of adja-
-!    cent triangles) with the other diagonal.  Equivalently, a
-!    pair of adjacent triangles is replaced by another pair
-!    having the same union.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) IN1, IN2, IO1, IO2, nodal indexes of the 
-!    vertices of the quadrilateral.  IO1-IO2 is replaced by IN1-IN2.  
-!    (IO1,IO2,IN1) and (IO2,IO1,IN2) must be triangles on input.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    the data structure defining the triangulation, created by TRMESH.  
-!    On output, updated with the swap; triangles (IO1,IO2,IN1) an (IO2,IO1,IN2) 
-!    are replaced by (IN1,IN2,IO2) and (IN2,IN1,IO1) unless LP21 = 0.
-!
-!    Output, integer ( kind = 4 ) LP21, index of IN1 as a neighbor of IN2 after
-!    the swap is performed unless IN1 and IN2 are adjacent on input, in which 
-!    case LP21 = 0.
-!
-!  Local parameters:
-!
-!    LP, LPH, LPSAV = LIST pointers
-!
-  implicit none
-
-  integer ( kind = 4 ) in1
-  integer ( kind = 4 ) in2
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpsav
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-!
-!  Test for IN1 and IN2 adjacent.
-!
-  lp = lstptr ( lend(in1), in2, list, lptr )
-
-  if ( abs ( list(lp) ) == in2 ) then
-    lp21 = 0
-    return
-  end if
-!
-!  Delete IO2 as a neighbor of IO1.
-!
-  lp = lstptr ( lend(io1), in2, list, lptr )
-  lph = lptr(lp)
-  lptr(lp) = lptr(lph)
-!
-!  If IO2 is the last neighbor of IO1, make IN2 the last neighbor.
-!
-  if ( lend(io1) == lph ) then
-    lend(io1) = lp
-  end if
-!
-!  Insert IN2 as a neighbor of IN1 following IO1 using the hole created above.
-!
-  lp = lstptr ( lend(in1), io1, list, lptr )
-  lpsav = lptr(lp)
-  lptr(lp) = lph
-  list(lph) = in2
-  lptr(lph) = lpsav
-!
-!  Delete IO1 as a neighbor of IO2.
-!
-  lp = lstptr ( lend(io2), in1, list, lptr )
-  lph = lptr(lp)
-  lptr(lp) = lptr(lph)
-!
-!  If IO1 is the last neighbor of IO2, make IN1 the last neighbor.
-!
-  if ( lend(io2) == lph ) then
-    lend(io2) = lp
-  end if
-!
-!  Insert IN1 as a neighbor of IN2 following IO2.
-!
-  lp = lstptr ( lend(in2), io2, list, lptr )
-  lpsav = lptr(lp)
-  lptr(lp) = lph
-  list(lph) = in1
-  lptr(lph) = lpsav
-  lp21 = lph
-
-  return
-end
-function swptst ( n1, n2, n3, n4, x, y, z )
-
-!*****************************************************************************80
-!
-!! SWPTST decides whether to replace a diagonal arc by the other.
-!
-!  Discussion:
-!
-!    This function decides whether or not to replace a
-!    diagonal arc in a quadrilateral with the other diagonal.
-!    The decision will be to swap (SWPTST = TRUE) if and only
-!    if N4 lies above the plane (in the half-space not contain-
-!    ing the origin) defined by (N1,N2,N3), or equivalently, if
-!    the projection of N4 onto this plane is interior to the
-!    circumcircle of (N1,N2,N3).  The decision will be for no
-!    swap if the quadrilateral is not strictly convex.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N1, N2, N3, N4, indexes of the four nodes 
-!    defining the quadrilateral with N1 adjacent to N2, and (N1,N2,N3) in 
-!    counterclockwise order.  The arc connecting N1 to N2 should be replaced 
-!    by an arc connecting N3 to N4 if SWPTST = TRUE.  Refer to subroutine SWAP.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes. 
-!
-!    Output, logical SWPTST, TRUE if and only if the arc connecting N1
-!    and N2 should be swapped for an arc connecting N3 and N4.
-!
-!  Local parameters:
-!
-!    DX1,DY1,DZ1 = Coordinates of N4->N1
-!    DX2,DY2,DZ2 = Coordinates of N4->N2
-!    DX3,DY3,DZ3 = Coordinates of N4->N3
-!    X4,Y4,Z4 =    Coordinates of N4
-!
-  implicit none
-
-  real    ( kind = 8 ) dx1
-  real    ( kind = 8 ) dx2
-  real    ( kind = 8 ) dx3
-  real    ( kind = 8 ) dy1
-  real    ( kind = 8 ) dy2
-  real    ( kind = 8 ) dy3
-  real    ( kind = 8 ) dz1
-  real    ( kind = 8 ) dz2
-  real    ( kind = 8 ) dz3
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) n4
-  logical swptst
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x4
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y4
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z4
-
-  x4 = x(n4)
-  y4 = y(n4)
-  z4 = z(n4)
-  dx1 = x(n1) - x4
-  dx2 = x(n2) - x4
-  dx3 = x(n3) - x4
-  dy1 = y(n1) - y4
-  dy2 = y(n2) - y4
-  dy3 = y(n3) - y4
-  dz1 = z(n1) - z4
-  dz2 = z(n2) - z4
-  dz3 = z(n3) - z4
-!
-!  N4 lies above the plane of (N1,N2,N3) iff N3 lies above
-!  the plane of (N2,N1,N4) iff Det(N3-N4,N2-N4,N1-N4) =
-!  (N3-N4,N2-N4 X N1-N4) > 0.
-!
-  swptst =  dx3 * ( dy2 * dz1 - dy1 * dz2 ) &
-          - dy3 * ( dx2 * dz1 - dx1 * dz2 ) &
-          + dz3 * ( dx2 * dy1 - dx1 * dy2 ) > 0.0D+00
-
-  return
-end
-subroutine timestamp ( )
-
-!*****************************************************************************80
-!
-!! TIMESTAMP prints the current YMDHMS date as a time stamp.
-!
-!  Example:
-!
-!    May 31 2001   9:45:54.872 AM
-!
-!  Modified:
-!
-!    26 February 2005
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    None
-!
-  implicit none
-
-  character ( len = 8 ) ampm
-  integer ( kind = 4 ) d
-  integer ( kind = 4 ) h
-  integer ( kind = 4 ) m
-  integer ( kind = 4 ) mm
-  character ( len = 9 ), parameter, dimension(12) :: month = (/ &
-    'January  ', 'February ', 'March    ', 'April    ', &
-    'May      ', 'June     ', 'July     ', 'August   ', &
-    'September', 'October  ', 'November ', 'December ' /)
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) s
-  integer ( kind = 4 ) values(8)
-  integer ( kind = 4 ) y
-
-  call date_and_time ( values = values )
-
-  y = values(1)
-  m = values(2)
-  d = values(3)
-  h = values(5)
-  n = values(6)
-  s = values(7)
-  mm = values(8)
-
-  if ( h < 12 ) then
-    ampm = 'AM'
-  else if ( h == 12 ) then
-    if ( n == 0 .and. s == 0 ) then
-      ampm = 'Noon'
-    else
-      ampm = 'PM'
-    end if
-  else
-    h = h - 12
-    if ( h < 12 ) then
-      ampm = 'PM'
-    else if ( h == 12 ) then
-      if ( n == 0 .and. s == 0 ) then
-        ampm = 'Midnight'
-      else
-        ampm = 'AM'
-      end if
-    end if
-  end if
-
-  write ( *, '(a,1x,i2,1x,i4,2x,i2,a1,i2.2,a1,i2.2,a1,i3.3,1x,a)' ) &
-    trim ( month(m) ), d, y, h, ':', n, ':', s, '.', mm, trim ( ampm )
-
-  return
-end
-subroutine trans ( n, rlat, rlon, x, y, z )
-
-!*****************************************************************************80
-!
-!! TRANS transforms spherical coordinates to Cartesian coordinates.
-!
-!  Discussion:
-!
-!    This subroutine transforms spherical coordinates into
-!    Cartesian coordinates on the unit sphere for input to
-!    TRMESH.  Storage for X and Y may coincide with
-!    storage for RLAT and RLON if the latter need not be saved.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes (points on the unit 
-!    sphere) whose coordinates are to be transformed.
-!
-!    Input, real ( kind = 8 ) RLAT(N), latitudes of the nodes in radians.
-!
-!    Input, real ( kind = 8 ) RLON(N), longitudes of the nodes in radians.
-!
-!    Output, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates in the 
-!    range -1 to 1.  X(I)**2 + Y(I)**2 + Z(I)**2 = 1 for I = 1 to N.
-!
-!  Local parameters:
-!
-!    COSPHI = cos(PHI)
-!    I =      DO-loop index
-!    NN =     Local copy of N
-!    PHI =    Latitude
-!    THETA =  Longitude
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) cosphi
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) nn
-  real    ( kind = 8 ) phi
-  real    ( kind = 8 ) rlat(n)
-  real    ( kind = 8 ) rlon(n)
-  real    ( kind = 8 ) theta
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nn = n
-
-  do i = 1, nn
-    phi = rlat(i)
-    theta = rlon(i)
-    cosphi = cos ( phi )
-    x(i) = cosphi * cos ( theta )
-    y(i) = cosphi * sin ( theta )
-    z(i) = sin ( phi )
-  end do
-
-  return
-end
-subroutine trfind ( nst, p, n, x, y, z, list, lptr, lend, b1, b2, b3, i1, &
-  i2, i3 )
-
-!*****************************************************************************80
-!
-!! TRFIND locates a point relative to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine locates a point P relative to a triangulation
-!    created by TRMESH.  If P is contained in
-!    a triangle, the three vertex indexes and barycentric 
-!    coordinates are returned.  Otherwise, the indexes of the
-!    visible boundary nodes are returned.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) NST, index of a node at which TRFIND begins
-!    its search.  Search time depends on the proximity of this node to P.
-!
-!    Input, real ( kind = 8 ) P(3), the x, y, and z coordinates (in that order)
-!    of the point P to be located.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the
-!    triangulation nodes (unit vectors).
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the 
-!    data structure defining the triangulation, created by TRMESH.
-!
-!    Output, real ( kind = 8 ) B1, B2, B3, the unnormalized barycentric
-!    coordinates of the central projection of P onto the underlying planar
-!    triangle if P is in the convex hull of the nodes.  These parameters 
-!    are not altered if I1 = 0.
-!
-!    Output, integer ( kind = 4 ) I1, I2, I3, the counterclockwise-ordered 
-!    vertex indexes of a triangle containing P if P is contained in a triangle.
-!    If P is not in the convex hull of the nodes, I1 and I2 are the rightmost 
-!    and leftmost (boundary) nodes that are visible from P, and I3 = 0.  (If 
-!    all boundary nodes are visible from P, then I1 and I2 coincide.)
-!    I1 = I2 = I3 = 0 if P and all of the nodes are coplanar (lie on a 
-!    common great circle.
-!
-!  Local parameters:
-!
-!    EPS =      Machine precision
-!    IX,IY,IZ = Integer seeds for JRAND
-!    LP =       LIST pointer
-!    N0,N1,N2 = Nodes in counterclockwise order defining a
-!               cone (with vertex N0) containing P, or end-
-!               points of a boundary edge such that P Right
-!               N1->N2
-!    N1S,N2S =  Initially-determined values of N1 and N2
-!    N3,N4 =    Nodes opposite N1->N2 and N2->N1, respectively
-!    NEXT =     Candidate for I1 or I2 when P is exterior
-!    NF,NL =    First and last neighbors of N0, or first
-!               (rightmost) and last (leftmost) nodes
-!               visible from P when P is exterior to the
-!               triangulation
-!    PTN1 =     Scalar product <P,N1>
-!    PTN2 =     Scalar product <P,N2>
-!    Q =        (N2 X N1) X N2  or  N1 X (N2 X N1) -- used in
-!               the boundary traversal when P is exterior
-!    S12 =      Scalar product <N1,N2>
-!    TOL =      Tolerance (multiple of EPS) defining an upper
-!               bound on the magnitude of a negative bary-
-!               centric coordinate (B1 or B2) for P in a
-!               triangle -- used to avoid an infinite number
-!               of restarts with 0 <= B3 < EPS and B1 < 0 or
-!               B2 < 0 but small in magnitude
-!    XP,YP,ZP = Local variables containing P(1), P(2), and P(3)
-!    X0,Y0,Z0 = Dummy arguments for DET
-!    X1,Y1,Z1 = Dummy arguments for DET
-!    X2,Y2,Z2 = Dummy arguments for DET
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) b1
-  real    ( kind = 8 ) b2
-  real    ( kind = 8 ) b3
-  real    ( kind = 8 ) det
-  real    ( kind = 8 ) eps
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ), save :: ix = 1
-  integer ( kind = 4 ), save :: iy = 2
-  integer ( kind = 4 ), save :: iz = 3
-  integer ( kind = 4 ) jrand
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n1s
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n2s
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) n4
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nf
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ) nst
-  real    ( kind = 8 ) p(3)
-  real    ( kind = 8 ) ptn1
-  real    ( kind = 8 ) ptn2
-  real    ( kind = 8 ) q(3)
-  real    ( kind = 8 ) s12
-  real    ( kind = 8 ) store
-  real    ( kind = 8 ) tol
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) xp
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) yp
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-  real    ( kind = 8 ) zp
-!
-!  Statement function:
-!
-!  DET(X1,...,Z0) >= 0 if and only if (X0,Y0,Z0) is in the
-!  (closed) left hemisphere defined by the plane containing (0,0,0),
-!  (X1,Y1,Z1), and (X2,Y2,Z2), where left is defined relative to an 
-!  observer at (X1,Y1,Z1) facing (X2,Y2,Z2).
-!
-  det (x1,y1,z1,x2,y2,z2,x0,y0,z0) = x0*(y1*z2-y2*z1) &
-       - y0*(x1*z2-x2*z1) + z0*(x1*y2-x2*y1)
-!
-!  Initialize variables.
-!
-  xp = p(1)
-  yp = p(2)
-  zp = p(3)
-  n0 = nst
-
-  if ( n0 < 1 .or. n < n0 ) then
-    n0 = jrand ( n, ix, iy, iz )
-  end if
-!
-!  Compute the relative machine precision EPS and TOL.
-!
-  eps = epsilon ( eps )
-  tol = 100.0D+00 * eps
-!
-!  Set NF and NL to the first and last neighbors of N0, and initialize N1 = NF.
-!
-2 continue
-
-  lp = lend(n0)
-  nl = list(lp)
-  lp = lptr(lp)
-  nf = list(lp)
-  n1 = nf
-!
-!  Find a pair of adjacent neighbors N1,N2 of N0 that define
-!  a wedge containing P:  P LEFT N0->N1 and P RIGHT N0->N2.
-!
-  if ( 0 < nl ) then
-!
-!  N0 is an interior node.  Find N1.
-!
-3   continue
-
-    if ( det ( x(n0),y(n0),z(n0),x(n1),y(n1),z(n1),xp,yp,zp ) < 0.0D+00 ) then
-      lp = lptr(lp)
-      n1 = list(lp)
-      if ( n1 == nl ) then
-        go to 6
-      end if
-      go to 3
-    end if
-
-  else
-!
-!  N0 is a boundary node.  Test for P exterior.
-!
-    nl = -nl
-!
-!  Is P to the right of the boundary edge N0->NF?
-!
-    if ( det(x(n0),y(n0),z(n0),x(nf),y(nf),z(nf), xp,yp,zp) < 0.0D+00 ) then
-      n1 = n0
-      n2 = nf
-      go to 9
-    end if
-!
-!  Is P to the right of the boundary edge NL->N0?
-!
-    if ( det(x(nl),y(nl),z(nl),x(n0),y(n0),z(n0),xp,yp,zp) < 0.0D+00 ) then
-      n1 = nl
-      n2 = n0
-      go to 9
-    end if
-
-  end if
-!
-!  P is to the left of arcs N0->N1 and NL->N0.  Set N2 to the
-!  next neighbor of N0 (following N1).
-!
-4 continue
-
-    lp = lptr(lp)
-    n2 = abs ( list(lp) )
-
-    if ( det(x(n0),y(n0),z(n0),x(n2),y(n2),z(n2),xp,yp,zp) < 0.0D+00 ) then
-      go to 7
-    end if
-
-    n1 = n2
-
-    if ( n1 /= nl ) then
-      go to 4
-    end if
-
-  if ( det ( x(n0), y(n0), z(n0), x(nf), y(nf), z(nf), xp, yp, zp ) &
-    < 0.0D+00 ) then
-    go to 6
-  end if
-!
-!  P is left of or on arcs N0->NB for all neighbors NB
-!  of N0.  Test for P = +/-N0.
-!
-  if ( store ( abs ( x(n0 ) * xp + y(n0) * yp + z(n0) * zp) ) &
-    < 1.0D+00 - 4.0D+00 * eps ) then
-!
-!  All points are collinear iff P Left NB->N0 for all
-!  neighbors NB of N0.  Search the neighbors of N0.
-!  Note:  N1 = NL and LP points to NL.
-!
-    do
-
-      if ( det(x(n1),y(n1),z(n1),x(n0),y(n0),z(n0),xp,yp,zp) < 0.0D+00 ) then
-        exit
-      end if
-
-      lp = lptr(lp)
-      n1 = abs ( list(lp) )
-
-      if ( n1 == nl ) then
-        i1 = 0
-        i2 = 0
-        i3 = 0
-        return
-      end if
-
-    end do
-
-  end if
-!
-!  P is to the right of N1->N0, or P = +/-N0.  Set N0 to N1 and start over.
-!
-  n0 = n1
-  go to 2
-!
-!  P is between arcs N0->N1 and N0->NF.
-!
-6 continue
-
-  n2 = nf
-!
-!  P is contained in a wedge defined by geodesics N0-N1 and
-!  N0-N2, where N1 is adjacent to N2.  Save N1 and N2 to
-!  test for cycling.
-!
-7 continue
-
-  n3 = n0
-  n1s = n1
-  n2s = n2
-!
-!  Top of edge-hopping loop:
-!
-8 continue
-
-  b3 = det ( x(n1),y(n1),z(n1),x(n2),y(n2),z(n2),xp,yp,zp )
-
-  if ( b3 < 0.0D+00 ) then
-!
-!  Set N4 to the first neighbor of N2 following N1 (the
-!  node opposite N2->N1) unless N1->N2 is a boundary arc.
-!
-    lp = lstptr ( lend(n2), n1, list, lptr )
-
-    if ( list(lp) < 0 ) then
-      go to 9
-    end if
-
-    lp = lptr(lp)
-    n4 = abs ( list(lp) )
-!
-!  Define a new arc N1->N2 which intersects the geodesic N0-P.
-!
-    if ( det ( x(n0),y(n0),z(n0),x(n4),y(n4),z(n4),xp,yp,zp ) < 0.0D+00 ) then
-      n3 = n2
-      n2 = n4
-      n1s = n1
-      if ( n2 /= n2s .and. n2 /= n0 ) then
-        go to 8
-      end if
-    else
-      n3 = n1
-      n1 = n4
-      n2s = n2
-      if ( n1 /= n1s .and. n1 /= n0 ) then
-        go to 8
-      end if
-    end if
-!
-!  The starting node N0 or edge N1-N2 was encountered
-!  again, implying a cycle (infinite loop).  Restart
-!  with N0 randomly selected.
-!
-    n0 = jrand ( n, ix, iy, iz )
-    go to 2
-
-  end if
-!
-!  P is in (N1,N2,N3) unless N0, N1, N2, and P are collinear
-!  or P is close to -N0.
-!
-  if ( b3 >= eps ) then
-!
-!  B3 /= 0.
-!
-    b1 = det(x(n2),y(n2),z(n2),x(n3),y(n3),z(n3),xp,yp,zp)
-    b2 = det(x(n3),y(n3),z(n3),x(n1),y(n1),z(n1),xp,yp,zp)
-!
-!  Restart with N0 randomly selected.
-!
-    if ( b1 < -tol .or. b2 < -tol ) then
-      n0 = jrand ( n, ix, iy, iz )
-      go to 2
-    end if
-
-  else
-!
-!  B3 = 0 and thus P lies on N1->N2. Compute
-!  B1 = Det(P,N2 X N1,N2) and B2 = Det(P,N1,N2 X N1).
-!
-    b3 = 0.0D+00
-    s12 = x(n1) * x(n2) + y(n1) * y(n2) + z(n1) * z(n2)
-    ptn1 = xp * x(n1) + yp * y(n1) + zp * z(n1)
-    ptn2 = xp * x(n2) + yp * y(n2) + zp * z(n2)
-    b1 = ptn1 - s12 * ptn2
-    b2 = ptn2 - s12 * ptn1
-!
-!  Restart with N0 randomly selected.
-!
-    if ( b1 < -tol .or. b2 < -tol ) then
-      n0 = jrand ( n, ix, iy, iz )
-      go to 2
-    end if
-
-  end if
-!
-!  P is in (N1,N2,N3).
-!
-  i1 = n1
-  i2 = n2
-  i3 = n3
-  b1 = max ( b1, 0.0D+00 )
-  b2 = max ( b2, 0.0D+00 )
-  return
-!
-!  P Right N1->N2, where N1->N2 is a boundary edge.
-!  Save N1 and N2, and set NL = 0 to indicate that
-!  NL has not yet been found.
-!
-9 continue
-
-  n1s = n1
-  n2s = n2
-  nl = 0
-!
-!  Counterclockwise Boundary Traversal:
-!
-10 continue
-
-  lp = lend(n2)
-  lp = lptr(lp)
-  next = list(lp)
-
-  if ( det(x(n2),y(n2),z(n2),x(next),y(next),z(next),xp,yp,zp) >= 0.0D+00 ) then
-!
-!  N2 is the rightmost visible node if P Forward N2->N1
-!  or NEXT Forward N2->N1.  Set Q to (N2 X N1) X N2.
-!
-    s12 = x(n1) * x(n2) + y(n1) * y(n2) + z(n1) * z(n2)
-
-    q(1) = x(n1) - s12 * x(n2)
-    q(2) = y(n1) - s12 * y(n2)
-    q(3) = z(n1) - s12 * z(n2)
-
-    if ( xp * q(1) + yp * q(2) + zp * q(3) >= 0.0D+00 ) then
-      go to 11
-    end if
-
-    if ( x(next) * q(1) + y(next) * q(2) + z(next) * q(3) >= 0.0D+00 ) then
-      go to 11
-    end if
-!
-!  N1, N2, NEXT, and P are nearly collinear, and N2 is
-!  the leftmost visible node.
-!
-    nl = n2
-  end if
-!
-!  Bottom of counterclockwise loop:
-!
-  n1 = n2
-  n2 = next
-
-  if ( n2 /= n1s ) then
-    go to 10
-  end if
-!
-!  All boundary nodes are visible from P.
-!
-  i1 = n1s
-  i2 = n1s
-  i3 = 0
-  return
-!
-!  N2 is the rightmost visible node.
-!
-11 continue
-
-  nf = n2
-
-  if ( nl == 0 ) then
-!
-!  Restore initial values of N1 and N2, and begin the search
-!  for the leftmost visible node.
-!
-    n2 = n2s
-    n1 = n1s
-!
-!  Clockwise Boundary Traversal:
-!
-12  continue
-
-    lp = lend(n1)
-    next = -list(lp)
-
-    if ( det(x(next),y(next),z(next),x(n1),y(n1),z(n1),xp,yp,zp) >= 0.0D+00 ) then
-!
-!  N1 is the leftmost visible node if P or NEXT is
-!  forward of N1->N2.  Compute Q = N1 X (N2 X N1).
-!
-      s12 = x(n1) * x(n2) + y(n1) * y(n2) + z(n1) * z(n2)
-      q(1) = x(n2) - s12 * x(n1)
-      q(2) = y(n2) - s12 * y(n1)
-      q(3) = z(n2) - s12 * z(n1)
-
-      if ( xp * q(1) + yp * q(2) + zp * q(3) >= 0.0D+00 ) then
-        go to 13
-      end if
-
-      if ( x(next) * q(1) + y(next) * q(2) + z(next) * q(3) >= 0.0D+00 ) then
-        go to 13
-      end if
-!
-!  P, NEXT, N1, and N2 are nearly collinear and N1 is the rightmost 
-!  visible node.
-!
-      nf = n1
-    end if
-!
-!  Bottom of clockwise loop:
-!
-    n2 = n1
-    n1 = next
-
-    if ( n1 /= n1s ) then
-      go to 12
-    end if
-!
-!  All boundary nodes are visible from P.
-!
-    i1 = n1
-    i2 = n1
-    i3 = 0
-    return
-!
-!  N1 is the leftmost visible node.
-!
-13   continue
-
-    nl = n1
-
-  end if
-!
-!  NF and NL have been found.
-!
-  i1 = nf
-  i2 = nl
-  i3 = 0
-
-  return
-end
-subroutine trlist ( n, list, lptr, lend, nrow, nt, ltri, ier )
-
-!*****************************************************************************80
-!
-!! TRLIST converts a triangulation data structure to a triangle list.
-!
-!  Discussion:
-!
-!    This subroutine converts a triangulation data structure
-!    from the linked list created by TRMESH to a triangle list.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), linked
-!    list data structure defining the triangulation.  Refer to TRMESH.
-!
-!    Input, integer ( kind = 4 ) NROW, the number of rows (entries per triangle) 
-!    reserved for the triangle list LTRI.  The value must be 6 if only the 
-!    vertex indexes and neighboring triangle indexes are to be stored, or 9
-!    if arc indexes are also to be assigned and stored.  Refer to LTRI.
-!
-!    Output, integer ( kind = 4 ) NT, the number of triangles in the 
-!    triangulation unless IER /=0, in which case NT = 0.  NT = 2N-NB-2 if 
-!    NB >= 3 or 2N-4 if NB = 0, where NB is the number of boundary nodes.
-!
-!    Output, integer ( kind = 4 ) LTRI(NROW,*).  The second dimension of LTRI
-!    must be at least NT, where NT will be at most 2*N-4.  The J-th column 
-!    contains the vertex nodal indexes (first three rows), neighboring triangle 
-!    indexes (second three rows), and, if NROW = 9, arc indexes (last three
-!    rows) associated with triangle J for J = 1,...,NT.  The vertices are
-!    ordered counterclockwise with the first vertex taken to be the one 
-!    with smallest index.  Thus, LTRI(2,J) and LTRI(3,J) are larger than
-!    LTRI(1,J) and index adjacent neighbors of node LTRI(1,J).  For 
-!    I = 1,2,3, LTRI(I+3,J) and LTRI(I+6,J) index the triangle and arc,
-!    respectively, which are opposite (not shared by) node LTRI(I,J), with
-!    LTRI(I+3,J) = 0 if LTRI(I+6,J) indexes a boundary arc.  Vertex indexes
-!    range from 1 to N, triangle indexes from 0 to NT, and, if included, 
-!    arc indexes from 1 to NA, where NA = 3N-NB-3 if NB >= 3 or 3N-6 if 
-!    NB = 0.  The triangles are ordered on first (smallest) vertex indexes.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator.
-!    0, if no errors were encountered.
-!    1, if N or NROW is outside its valid range on input.
-!    2, if the triangulation data structure (LIST,LPTR,LEND) is invalid.  
-!      Note, however, that these arrays are not completely tested for validity.
-!
-!  Local parameters:
-!
-!    ARCS =     Logical variable with value TRUE iff are
-!               indexes are to be stored
-!    I,J =      LTRI row indexes (1 to 3) associated with
-!               triangles KT and KN, respectively
-!    I1,I2,I3 = Nodal indexes of triangle KN
-!    ISV =      Variable used to permute indexes I1,I2,I3
-!    KA =       Arc index and number of currently stored arcs
-!    KN =       Index of the triangle that shares arc I1-I2 with KT
-!    KT =       Triangle index and number of currently stored triangles
-!    LP =       LIST pointer
-!    LP2 =      Pointer to N2 as a neighbor of N1
-!    LPL =      Pointer to the last neighbor of I1
-!    LPLN1 =    Pointer to the last neighbor of N1
-!    N1,N2,N3 = Nodal indexes of triangle KT
-!    NM2 =      N-2
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) nrow
-
-  logical arcs
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) isv
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) ka
-  integer ( kind = 4 ) kn
-  integer ( kind = 4 ) kt
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp2
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpln1
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) ltri(nrow,*)
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) nm2
-  integer ( kind = 4 ) nt
-!
-!  Test for invalid input parameters.
-!
-  if ( n < 3 .or. ( nrow /= 6 .and. nrow /= 9 ) ) then
-    nt = 0
-    ier = 1
-    return
-  end if
-!
-!  Initialize parameters for loop on triangles KT = (N1,N2,
-!  N3), where N1 < N2 and N1 < N3.
-!
-!  ARCS = TRUE iff arc indexes are to be stored.
-!  KA,KT = Numbers of currently stored arcs and triangles.
-!  NM2 = Upper bound on candidates for N1.
-!
-  arcs = nrow == 9
-  ka = 0
-  kt = 0
-  nm2 = n-2
-!
-!  Loop on nodes N1.
-!
-  do n1 = 1, nm2
-!
-!  Loop on pairs of adjacent neighbors (N2,N3).  LPLN1 points
-!  to the last neighbor of N1, and LP2 points to N2.
-!
-    lpln1 = lend(n1)
-    lp2 = lpln1
-
-1   continue
-
-      lp2 = lptr(lp2)
-      n2 = list(lp2)
-      lp = lptr(lp2)
-      n3 = abs ( list(lp) )
-
-      if ( n2 < n1 .or. n3 < n1 ) then
-        go to 8
-      end if
-!
-!  Add a new triangle KT = (N1,N2,N3).
-!
-      kt = kt + 1
-      ltri(1,kt) = n1
-      ltri(2,kt) = n2
-      ltri(3,kt) = n3
-!
-!  Loop on triangle sides (I2,I1) with neighboring triangles
-!  KN = (I1,I2,I3).
-!
-      do i = 1, 3
-
-        if ( i == 1 ) then
-          i1 = n3
-          i2 = n2
-        else if ( i == 2 ) then
-          i1 = n1
-          i2 = n3
-        else
-          i1 = n2
-          i2 = n1
-        end if
-!
-!  Set I3 to the neighbor of I1 that follows I2 unless
-!  I2->I1 is a boundary arc.
-!
-        lpl = lend(i1)
-        lp = lptr(lpl)
-
-        do
-
-          if ( list(lp) == i2 ) then
-            go to 3
-          end if
-
-          lp = lptr(lp)
-
-          if ( lp == lpl ) then
-            exit
-          end if
-
-        end do
-!
-!  Invalid triangulation data structure:  I1 is a neighbor of
-!  I2, but I2 is not a neighbor of I1.
-!
-        if ( abs ( list(lp) ) /= i2 ) then
-          nt = 0
-          ier = 2
-          return
-        end if
-!
-!  I2 is the last neighbor of I1.  Bypass the search for a neighboring
-!  triangle if I2->I1 is a boundary arc.
-!
-        kn = 0
-
-        if ( list(lp) < 0 ) then
-          go to 6
-        end if
-!
-!  I2->I1 is not a boundary arc, and LP points to I2 as
-!  a neighbor of I1.
-!
-3       continue
-
-        lp = lptr(lp)
-        i3 = abs ( list(lp) )
-!
-!  Find J such that LTRI(J,KN) = I3 (not used if KT < KN),
-!  and permute the vertex indexes of KN so that I1 is smallest.
-!
-        if ( i1 < i2 .and. i1 < i3 ) then
-          j = 3
-        else if ( i2 < i3 ) then
-          j = 2
-          isv = i1
-          i1 = i2
-          i2 = i3
-          i3 = isv
-        else
-          j = 1
-          isv = i1
-          i1 = i3
-          i3 = i2
-          i2 = isv
-        end if
-!
-!  Test for KT < KN (triangle index not yet assigned).
-!
-        if ( n1 < i1 ) then
-          cycle
-        end if
-!
-!  Find KN, if it exists, by searching the triangle list in
-!  reverse order.
-!
-        do kn = kt-1, 1, -1
-          if ( ltri(1,kn) == i1 .and. &
-               ltri(2,kn) == i2 .and. &
-               ltri(3,kn) == i3 ) then
-            go to 5
-          end if
-        end do
-
-        cycle
-!
-!  Store KT as a neighbor of KN.
-!
-5       continue
-
-        ltri(j+3,kn) = kt
-!
-!  Store KN as a neighbor of KT, and add a new arc KA.
-!
-6       continue
-
-        ltri(i+3,kt) = kn
-
-        if ( arcs ) then
-          ka = ka + 1
-          ltri(i+6,kt) = ka
-          if ( kn /= 0 ) then
-            ltri(j+6,kn) = ka
-          end if
-        end if
-
-        end do
-!
-!  Bottom of loop on triangles.
-!
-8     continue
-
-      if ( lp2 /= lpln1 ) then
-        go to 1
-      end if
-
-9     continue
-
-  end do
-
-  nt = kt
-  ier = 0
-
-  return
-end
-subroutine trlist2 ( n, list, lptr, lend, nt, ltri, ier )
-
-!*****************************************************************************80
-!
-!! TRLIST2 converts a triangulation data structure to a triangle list.
-!
-!  Discussion:
-!
-!    This subroutine converts a triangulation data structure
-!    from the linked list created by TRMESH to a triangle list.
-!
-!    It is a version of TRLIST for the special case where the triangle
-!    list should only include the nodes that define each triangle.
-!
-!  Modified:
-!
-!    21 July 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), linked
-!    list data structure defining the triangulation.  Refer to TRMESH.
-!
-!    Output, integer ( kind = 4 ) NT, the number of triangles in the 
-!    triangulation unless IER /=0, in which case NT = 0.  NT = 2N-NB-2 if 
-!    NB >= 3 or 2N-4 if NB = 0, where NB is the number of boundary nodes.
-!
-!    Output, integer ( kind = 4 ) LTRI(3,*).  The second dimension of LTRI
-!    must be at least NT, where NT will be at most 2*N-4.  The J-th column 
-!    contains the vertex nodal indexes associated with triangle J for 
-!    J = 1,...,NT.  The vertices are ordered counterclockwise with the first
-!    vertex taken to be the one with smallest index.  Thus, LTRI(2,J) and 
-!    LTRI(3,J) are larger than LTRI(1,J) and index adjacent neighbors of node 
-!    LTRI(1,J).  The triangles are ordered on first (smallest) vertex indexes.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator.
-!    0, if no errors were encountered.
-!    1, if N is outside its valid range on input.
-!    2, if the triangulation data structure (LIST,LPTR,LEND) is invalid.  
-!      Note, however, that these arrays are not completely tested for validity.
-!
-!  Local parameters:
-!
-!    I,J =      LTRI row indexes (1 to 3) associated with
-!               triangles KT and KN, respectively
-!    I1,I2,I3 = Nodal indexes of triangle KN
-!    ISV =      Variable used to permute indexes I1,I2,I3
-!    KA =       Arc index and number of currently stored arcs
-!    KN =       Index of the triangle that shares arc I1-I2 with KT
-!    KT =       Triangle index and number of currently stored triangles
-!    LP =       LIST pointer
-!    LP2 =      Pointer to N2 as a neighbor of N1
-!    LPL =      Pointer to the last neighbor of I1
-!    LPLN1 =    Pointer to the last neighbor of N1
-!    N1,N2,N3 = Nodal indexes of triangle KT
-!    NM2 =      N-2
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) isv
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) ka
-  integer ( kind = 4 ) kn
-  integer ( kind = 4 ) kt
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp2
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpln1
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) ltri(3,*)
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) nm2
-  integer ( kind = 4 ) nt
-!
-!  Test for invalid input parameters.
-!
-  if ( n < 3 ) then
-    nt = 0
-    ier = 1
-    return
-  end if
-!
-!  Initialize parameters for loop on triangles KT = (N1,N2,
-!  N3), where N1 < N2 and N1 < N3.
-!
-!  KA,KT = Numbers of currently stored arcs and triangles.
-!  NM2 = Upper bound on candidates for N1.
-!
-  ka = 0
-  kt = 0
-  nm2 = n-2
-!
-!  Loop on nodes N1.
-!
-  do n1 = 1, nm2
-!
-!  Loop on pairs of adjacent neighbors (N2,N3).  LPLN1 points
-!  to the last neighbor of N1, and LP2 points to N2.
-!
-    lpln1 = lend(n1)
-    lp2 = lpln1
-
-1   continue
-
-      lp2 = lptr(lp2)
-      n2 = list(lp2)
-      lp = lptr(lp2)
-      n3 = abs ( list(lp) )
-
-      if ( n2 < n1 .or. n3 < n1 ) then
-        go to 8
-      end if
-!
-!  Add a new triangle KT = (N1,N2,N3).
-!
-      kt = kt + 1
-      ltri(1,kt) = n1
-      ltri(2,kt) = n2
-      ltri(3,kt) = n3
-!
-!  Loop on triangle sides (I2,I1) with neighboring triangles
-!  KN = (I1,I2,I3).
-!
-      do i = 1, 3
-
-        if ( i == 1 ) then
-          i1 = n3
-          i2 = n2
-        else if ( i == 2 ) then
-          i1 = n1
-          i2 = n3
-        else
-          i1 = n2
-          i2 = n1
-        end if
-!
-!  Set I3 to the neighbor of I1 that follows I2 unless
-!  I2->I1 is a boundary arc.
-!
-        lpl = lend(i1)
-        lp = lptr(lpl)
-
-        do
-
-          if ( list(lp) == i2 ) then
-            go to 3
-          end if
-
-          lp = lptr(lp)
-
-          if ( lp == lpl ) then
-            exit
-          end if
-
-        end do
-!
-!  Invalid triangulation data structure:  I1 is a neighbor of
-!  I2, but I2 is not a neighbor of I1.
-!
-        if ( abs ( list(lp) ) /= i2 ) then
-          nt = 0
-          ier = 2
-          return
-        end if
-!
-!  I2 is the last neighbor of I1.  Bypass the search for a neighboring
-!  triangle if I2->I1 is a boundary arc.
-!
-        kn = 0
-
-        if ( list(lp) < 0 ) then
-          go to 6
-        end if
-!
-!  I2->I1 is not a boundary arc, and LP points to I2 as
-!  a neighbor of I1.
-!
-3       continue
-
-        lp = lptr(lp)
-        i3 = abs ( list(lp) )
-!
-!  Find J such that LTRI(J,KN) = I3 (not used if KT < KN),
-!  and permute the vertex indexes of KN so that I1 is smallest.
-!
-        if ( i1 < i2 .and. i1 < i3 ) then
-          j = 3
-        else if ( i2 < i3 ) then
-          j = 2
-          isv = i1
-          i1 = i2
-          i2 = i3
-          i3 = isv
-        else
-          j = 1
-          isv = i1
-          i1 = i3
-          i3 = i2
-          i2 = isv
-        end if
-!
-!  Test for KT < KN (triangle index not yet assigned).
-!
-        if ( n1 < i1 ) then
-          cycle
-        end if
-!
-!  Find KN, if it exists, by searching the triangle list in
-!  reverse order.
-!
-        do kn = kt-1, 1, -1
-          if ( ltri(1,kn) == i1 .and. &
-               ltri(2,kn) == i2 .and. &
-               ltri(3,kn) == i3 ) then
-            go to 5
-          end if
-        end do
-
-        cycle
-
-5       continue
-
-6       continue
-
-        end do
-!
-!  Bottom of loop on triangles.
-!
-8     continue
-
-      if ( lp2 /= lpln1 ) then
-        go to 1
-      end if
-
-9     continue
-
-  end do
-
-  nt = kt
-  ier = 0
-
-  return
-end
-subroutine trlprt ( n, x, y, z, iflag, nrow, nt, ltri )
-
-!*****************************************************************************80
-!
-!! TRLPRT prints a triangle list.
-!
-!  Discussion:
-!
-!    This subroutine prints the triangle list created by TRLIST
-!    and, optionally, the nodal coordinates
-!    (either latitude and longitude or Cartesian coordinates).
-!    The numbers of boundary nodes, triangles, and arcs are also printed.
-!
-!  Modified:
-!
-!    06 June 2002
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N <= 9999.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes if 
-!    IFLAG = 0, or (X and Y only) longitude and latitude, respectively, 
-!    if 0 < IFLAG, or unused dummy parameters if IFLAG < 0.
-!
-!    Input, integer ( kind = 4 ) IFLAG, nodal coordinate option indicator:
-!    = 0, if X, Y, and Z (assumed to contain Cartesian coordinates) are to 
-!      be printed (to 6 decimal places).
-!    > 0, if only X and Y (assumed to contain longitude and latitude) are
-!      to be printed (to 6 decimal places).
-!    < 0, if only the adjacency lists are to be printed.
-!
-!    Input, integer ( kind = 4 ) NROW, the number of rows (entries per triangle)
-!    reserved for the triangle list LTRI.  The value must be 6 if only the
-!    vertex indexes and neighboring triangle indexes are stored, or 9
-!    if arc indexes are also stored.
-!
-!    Input, integer ( kind = 4 ) NT, the number of triangles in the 
-!    triangulation.  1 <= NT <= 9999.
-!
-!    Input, integer ( kind = 4 ) LTRI(NROW,NT), the J-th column contains the
-!    vertex nodal indexes (first three rows), neighboring triangle indexes 
-!    (second three rows), and, if NROW = 9, arc indexes (last three rows) 
-!    associated with triangle J for J = 1,...,NT.
-!
-!  Local parameters:
-!
-!    I =     DO-loop, nodal index, and row index for LTRI
-!    K =     DO-loop and triangle index
-!    NA =    Number of triangulation arcs
-!    NB =    Number of boundary nodes
-!    NL =    Number of lines printed on the current page
-!    NLMAX = Maximum number of print lines per page (except
-!            for the last page which may have two additional lines)
-!    NMAX =  Maximum value of N and NT (4-digit format)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) nrow
-  integer ( kind = 4 ) nt
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) iflag
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) ltri(nrow,nt)
-  integer ( kind = 4 ) na
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ), parameter :: nlmax = 58
-  integer ( kind = 4 ), parameter :: nmax = 9999
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-!
-!  Print a heading and test for invalid input.
-!
-  write (*,100) n
-  nl = 3
-
-  if ( n < 3 .or. nmax < n .or. &
-      ( nrow /= 6 .and. nrow /= 9)  .or. &
-      nt < 1 .or. nmax < nt ) then
-    write (*,110) n, nrow, nt
-    return
-  end if
-!
-!  Print X, Y, and Z.
-!
-  if ( iflag == 0 ) then
-
-    write (*,101)
-    nl = 6
-
-    do i = 1, n
-      if ( nlmax <= nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = 0
-      end if
-      write (*,103) i, x(i), y(i), z(i)
-      nl = nl + 1
-    end do
-!
-!  Print X (longitude) and Y (latitude).
-!
-  else if ( 0 < iflag ) then
-
-    write ( *, 102 )
-    nl = 6
-
-    do i = 1, n
-
-      if ( nlmax <= nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = 0
-      end if
-
-      write (*,104) i, x(i), y(i)
-      nl = nl + 1
-
-    end do
-
-  end if
-!
-!  Print the triangulation LTRI.
-!
-  if ( nlmax / 2 < nl ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) ' '
-    nl = 0
-  end if
-
-  if ( nrow == 6 ) then
-    write (*,105)
-  else
-    write (*,106)
-  end if
-
-  nl = nl + 5
-
-  do k = 1, nt
-    if ( nlmax <= nl ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) ' '
-      nl = 0
-    end if
-    write (*,107) k, ltri(1:nrow,k)
-    nl = nl + 1
-  end do
-!
-!  Print NB, NA, and NT (boundary nodes, arcs, and triangles).
-!
-  nb = 2 * n - nt - 2
-
-  if ( nb < 3 ) then
-    nb = 0
-    na = 3 * n - 6
-  else
-    na = nt + n - 1
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of boundary nodes NB = ', nb
-  write ( *, '(a,i8)' ) '  Number of arcs NA =           ', na
-  write ( *, '(a,i8)' ) '  Number of triangles NT =      ', nt
-  return
-!
-!  Print formats:
-!
-  100 format (///18x,'STRIPACK (TRLIST) output,  n = ',i4)
-  101 format (//8x,'Node',10x,'X(node)',10x,'Y(node)',10x, &
-          'Z(node)'//)
-  102 format (//16x,'Node        Longitude         Latitude'//)
-  103 format (8x,i4,3e17.6)
-  104 format (16x,i4,2e17.6)
-  105 format (//' triangle',8x,'vertices',12x,'neighbors'/ &
-          4x,'kt',7x,'n1',5x,'n2',5x,'n3',4x,'kt1',4x, &
-          'kt2',4x,'kt3'/)
-  106 format (//'triangle',8x,'vertices',12x,'neighbors',14x,'arcs'/ &
-          4x,'kt       n1     n2     n3    kt1',4x, &
-          'kt2    kt3    ka1    ka2    ka3'/)
-  107 format (2x,i4,2x,6(3x,i4),3(2x,i5))
-  110 format (//1x,10x,'Invalid parameter:  N =',i5, &
-          ', nrow =',i5,', nt =',i5,' ***')
-end
-subroutine trmesh ( n, x, y, z, list, lptr, lend, lnew, near, next, dist, ier )
-
-!*****************************************************************************80
-!
-!! TRMESH creates a Delaunay triangulation on the unit sphere.
-!
-!  Discussion:
-!
-!    This subroutine creates a Delaunay triangulation of a
-!    set of N arbitrarily distributed points, referred to as
-!    nodes, on the surface of the unit sphere.  The Delaunay
-!    triangulation is defined as a set of (spherical) triangles
-!    with the following five properties:
-!
-!     1)  The triangle vertices are nodes.
-!     2)  No triangle contains a node other than its vertices.
-!     3)  The interiors of the triangles are pairwise disjoint.
-!     4)  The union of triangles is the convex hull of the set
-!           of nodes (the smallest convex set that contains
-!           the nodes).  If the nodes are not contained in a
-!           single hemisphere, their convex hull is the 
-!           entire sphere and there are no boundary nodes.
-!           Otherwise, there are at least three boundary nodes.
-!     5)  The interior of the circumcircle of each triangle
-!           contains no node.
-!
-!    The first four properties define a triangulation, and the
-!    last property results in a triangulation which is as close
-!    as possible to equiangular in a certain sense and which is
-!    uniquely defined unless four or more nodes lie in a common
-!    plane.  This property makes the triangulation well-suited
-!    for solving closest-point problems and for triangle-based
-!    interpolation.
-!
-!    Provided the nodes are randomly ordered, the algorithm
-!    has expected time complexity O(N*log(N)) for most nodal
-!    distributions.  Note, however, that the complexity may be
-!    as high as O(N**2) if, for example, the nodes are ordered
-!    on increasing latitude.
-!
-!    Spherical coordinates (latitude and longitude) may be
-!    converted to Cartesian coordinates by Subroutine TRANS.
-!
-!    The following is a list of the software package modules
-!    which a user may wish to call directly:
-!
-!    ADDNOD - Updates the triangulation by appending a new node.
-!
-!    AREAS  - Returns the area of a spherical triangle.
-!
-!    BNODES - Returns an array containing the indexes of the
-!             boundary nodes (if any) in counterclockwise
-!             order.  Counts of boundary nodes, triangles,
-!             and arcs are also returned.
-!
-!    CIRCUM - Returns the circumcenter of a spherical triangle.
-!
-!    CRLIST - Returns the set of triangle circumcenters
-!             (Voronoi vertices) and circumradii associated
-!             with a triangulation.
-!
-!    DELARC - Deletes a boundary arc from a triangulation.
-!
-!    DELNOD - Updates the triangulation with a nodal deletion.
-!
-!    EDGE   - Forces an arbitrary pair of nodes to be connected
-!             by an arc in the triangulation.
-!
-!    GETNP  - Determines the ordered sequence of L closest nodes
-!             to a given node, along with the associated distances.
-!
-!    INSIDE - Locates a point relative to a polygon on the
-!             surface of the sphere.
-!
-!    INTRSC - Returns the point of intersection between a
-!             pair of great circle arcs.
-!
-!    JRAND  - Generates a uniformly distributed pseudo-random integer.
-!
-!    LEFT   - Locates a point relative to a great circle.
-!
-!    NEARND - Returns the index of the nearest node to an
-!             arbitrary point, along with its squared
-!             distance.
-!
-!    SCOORD - Converts a point from Cartesian coordinates to
-!             spherical coordinates.
-!
-!    STORE  - Forces a value to be stored in main memory so
-!             that the precision of floating point numbers
-!             in memory locations rather than registers is
-!             computed.
-!
-!    TRANS  - Transforms spherical coordinates into Cartesian
-!             coordinates on the unit sphere for input to
-!             Subroutine TRMESH.
-!
-!    TRLIST - Converts the triangulation data structure to a
-!             triangle list more suitable for use in a finite
-!             element code.
-!
-!    TRLPRT - Prints the triangle list created by TRLIST.
-!
-!    TRMESH - Creates a Delaunay triangulation of a set of
-!             nodes.
-!
-!    TRPLOT - Creates a level-2 Encapsulated Postscript (EPS)
-!             file containing a triangulation plot.
-!
-!    TRPRNT - Prints the triangulation data structure and,
-!             optionally, the nodal coordinates.
-!
-!    VRPLOT - Creates a level-2 Encapsulated Postscript (EPS)
-!             file containing a Voronoi diagram plot.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of distinct
-!    nodes.  (X(K),Y(K), Z(K)) is referred to as node K, and K is referred 
-!    to as a nodal index.  It is required that X(K)**2 + Y(K)**2 + Z(K)**2 = 1
-!    for all K.  The first three nodes must not be collinear (lie on a 
-!    common great circle).
-!
-!    Output, integer ( kind = 4 ) LIST(6*(N-2)), nodal indexes which, along 
-!    with LPTR, LEND, and LNEW, define the triangulation as a set of N 
-!    adjacency lists; counterclockwise-ordered sequences of neighboring nodes 
-!    such that the first and last neighbors of a boundary node are boundary 
-!    nodes (the first neighbor of an interior node is arbitrary).  In order to 
-!    distinguish between interior and boundary nodes, the last neighbor of 
-!    each boundary node is represented by the negative of its index.
-!
-!    Output, integer ( kind = 4 ) LPTR(6*(N-2)), = Set of pointers (LIST 
-!    indexes) in one-to-one correspondence with the elements of LIST.
-!    LIST(LPTR(I)) indexes the node which follows LIST(I) in cyclical
-!    counterclockwise order (the first neighbor follows the last neighbor).
-!
-!    Output, integer ( kind = 4 ) LEND(N), pointers to adjacency lists.  
-!    LEND(K) points to the last neighbor of node K.  LIST(LEND(K)) < 0 if and 
-!    only if K is a boundary node.
-!
-!    Output, integer ( kind = 4 ) LNEW, pointer to the first empty location 
-!    in LIST and LPTR (list length plus one).  LIST, LPTR, LEND, and LNEW are 
-!    not altered if IER < 0, and are incomplete if 0 < IER.
-!
-!    Workspace, integer ( kind = 4 ) NEAR(N), 
-!    used to efficiently determine the nearest triangulation node to each
-!    unprocessed node for use by ADDNOD.
-!
-!    Workspace, integer ( kind = 4 ) NEXT(N),
-!    used to efficiently determine the nearest triangulation node to each
-!    unprocessed node for use by ADDNOD.
-!
-!    Workspace, real ( kind = 8 ) DIST(N), 
-!    used to efficiently determine the nearest triangulation node to each
-!    unprocessed node for use by ADDNOD.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!     0, if no errors were encountered.
-!    -1, if N < 3 on input.
-!    -2, if the first three nodes are collinear.
-!     L, if nodes L and M coincide for some L < M.  The data structure 
-!      represents a triangulation of nodes 1 to M-1 in this case.
-!
-!  Local parameters:
-!
-!    D =        (Negative cosine of) distance from node K to node I
-!    D1,D2,D3 = Distances from node K to nodes 1, 2, and 3, respectively
-!    I,J =      Nodal indexes
-!    I0 =       Index of the node preceding I in a sequence of
-!               unprocessed nodes:  I = NEXT(I0)
-!    K =        Index of node to be added and DO-loop index: 3 < K
-!    LP =       LIST index (pointer) of a neighbor of K
-!    LPL =      Pointer to the last neighbor of K
-!    NEXTI =    NEXT(I)
-!    NN =       Local copy of N
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) d
-  real    ( kind = 8 ) d1
-  real    ( kind = 8 ) d2
-  real    ( kind = 8 ) d3
-  real    ( kind = 8 ) dist(n)
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) i0
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) k
-  logical left
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) near(n)
-  integer ( kind = 4 ) next(n)
-  integer ( kind = 4 ) nexti
-  integer ( kind = 4 ) nn
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nn = n
-
-  if ( nn < 3 ) then
-    ier = -1
-    return
-  end if
-!
-!  Store the first triangle in the linked list.
-!
-  if ( .not. left (x(1),y(1),z(1),x(2),y(2),z(2), &
-                   x(3),y(3),z(3) ) ) then
-!
-!  The first triangle is (3,2,1) = (2,1,3) = (1,3,2).
-!
-    list(1) = 3
-    lptr(1) = 2
-    list(2) = -2
-    lptr(2) = 1
-    lend(1) = 2
-
-    list(3) = 1
-    lptr(3) = 4
-    list(4) = -3
-    lptr(4) = 3
-    lend(2) = 4
-
-    list(5) = 2
-    lptr(5) = 6
-    list(6) = -1
-    lptr(6) = 5
-    lend(3) = 6
-
-  else if ( .not. left ( x(2),y(2),z(2),x(1),y(1),z(1),x(3),y(3),z(3) ) ) then
-!
-!  The first triangle is (1,2,3):  3 Strictly Left 1->2,
-!  i.e., node 3 lies in the left hemisphere defined by arc 1->2.
-!
-    list(1) = 2
-    lptr(1) = 2
-    list(2) = -3
-    lptr(2) = 1
-    lend(1) = 2
-
-    list(3) = 3
-    lptr(3) = 4
-    list(4) = -1
-    lptr(4) = 3
-    lend(2) = 4
-
-    list(5) = 1
-    lptr(5) = 6
-    list(6) = -2
-    lptr(6) = 5
-    lend(3) = 6
-!
-!  The first three nodes are collinear.
-!
-  else
-
-    ier = -2
-    return
-  end if
-!
-!  Initialize LNEW and test for N = 3.
-!
-  lnew = 7
-
-  if ( nn == 3 ) then
-    ier = 0
-    return
-  end if
-!
-!  A nearest-node data structure (NEAR, NEXT, and DIST) is
-!  used to obtain an expected-time (N*log(N)) incremental
-!  algorithm by enabling constant search time for locating
-!  each new node in the triangulation.
-!
-!  For each unprocessed node K, NEAR(K) is the index of the
-!  triangulation node closest to K (used as the starting
-!  point for the search in Subroutine TRFIND) and DIST(K)
-!  is an increasing function of the arc length (angular
-!  distance) between nodes K and NEAR(K):  -Cos(a) for arc
-!  length a.
-!
-!  Since it is necessary to efficiently find the subset of
-!  unprocessed nodes associated with each triangulation
-!  node J (those that have J as their NEAR entries), the
-!  subsets are stored in NEAR and NEXT as follows:  for
-!  each node J in the triangulation, I = NEAR(J) is the
-!  first unprocessed node in J's set (with I = 0 if the
-!  set is empty), L = NEXT(I) (if 0 < I) is the second,
-!  NEXT(L) (if 0 < L) is the third, etc.  The nodes in each
-!  set are initially ordered by increasing indexes (which
-!  maximizes efficiency) but that ordering is not main-
-!  tained as the data structure is updated.
-!
-!  Initialize the data structure for the single triangle.
-!
-  near(1) = 0
-  near(2) = 0
-  near(3) = 0
-
-  do k = nn, 4, -1
-
-    d1 = -( x(k) * x(1) + y(k) * y(1) + z(k) * z(1) )
-    d2 = -( x(k) * x(2) + y(k) * y(2) + z(k) * z(2) )
-    d3 = -( x(k) * x(3) + y(k) * y(3) + z(k) * z(3) )
-
-    if ( d1 <= d2 .and. d1 <= d3 ) then
-      near(k) = 1
-      dist(k) = d1
-      next(k) = near(1)
-      near(1) = k
-    else if ( d2 <= d1 .and. d2 <= d3 ) then
-      near(k) = 2
-      dist(k) = d2
-      next(k) = near(2)
-      near(2) = k
-    else
-      near(k) = 3
-      dist(k) = d3
-      next(k) = near(3)
-      near(3) = k
-    end if
-
-  end do
-!
-!  Add the remaining nodes.
-!
-  do k = 4, nn
-
-    call addnod ( near(k), k, x, y, z, list, lptr, lend, lnew, ier )
-
-    if ( ier /= 0 ) then
-       return
-    end if
-!
-!  Remove K from the set of unprocessed nodes associated with NEAR(K).
-!
-    i = near(k)
-
-    if ( near(i) == k ) then
-
-      near(i) = next(k)
-
-    else
-
-      i = near(i)
-
-      do
-
-        i0 = i
-        i = next(i0)
-
-        if ( i == k ) then
-          exit
-        end if
-
-      end do
-
-      next(i0) = next(k)
-
-    end if
-
-    near(k) = 0
-!
-!  Loop on neighbors J of node K.
-!
-    lpl = lend(k)
-    lp = lpl
-
-3   continue
-
-    lp = lptr(lp)
-    j = abs ( list(lp) )
-!
-!  Loop on elements I in the sequence of unprocessed nodes
-!  associated with J:  K is a candidate for replacing J
-!  as the nearest triangulation node to I.  The next value
-!  of I in the sequence, NEXT(I), must be saved before I
-!  is moved because it is altered by adding I to K's set.
-!
-    i = near(j)
-
-    do
-
-      if ( i == 0 ) then
-        exit
-      end if
-
-      nexti = next(i)
-!
-!  Test for the distance from I to K less than the distance
-!  from I to J.
-!
-      d = - ( x(i) * x(k) + y(i) * y(k) + z(i) * z(k) )
-      if ( d < dist(i) ) then
-!
-!  Replace J by K as the nearest triangulation node to I:
-!  update NEAR(I) and DIST(I), and remove I from J's set
-!  of unprocessed nodes and add it to K's set.
-!
-        near(i) = k
-        dist(i) = d
-
-        if ( i == near(j) ) then
-          near(j) = nexti
-        else
-          next(i0) = nexti
-        end if
-
-        next(i) = near(k)
-        near(k) = i
-      else
-        i0 = i
-      end if
-
-      i = nexti
-
-    end do
-!
-!  Bottom of loop on neighbors J.
-!
-5   continue
-
-    if ( lp /= lpl ) then
-      go to 3
-    end if
-
-6   continue
-
-  end do
-
-  return
-end
-subroutine trplot ( lun, pltsiz, elat, elon, a, n, x, y, z, list, lptr, &
-  lend, title, numbr, ier )
-
-!*****************************************************************************80
-!
-!! TRPLOT makes a PostScript image of a triangulation on a unit sphere.
-!
-!  Discussion:
-!
-!    This subroutine creates a level-2 Encapsulated Postscript (EPS) 
-!    file containing a graphical display of a triangulation of a set of 
-!    nodes on the unit sphere.  The visible nodes are projected onto the 
-!    plane that contains the origin and has normal defined by a 
-!    user-specified eye-position.  Projections of adjacent (visible) nodes 
-!    are connected by line segments.
-!
-!    The values in the data statements may be altered
-!    in order to modify various plotting options.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LUN, the logical unit number in the range 0
-!    to 99.  The unit should be opened with an appropriate
-!    file name before the call to this routine.
-!
-!    Input, real ( kind = 8 ) PLTSIZ, the plot size in inches.  A circular
-!    window in the projection plane is mapped to a circular viewport with
-!    diameter equal to 0.88 * PLTSIZ (leaving room for labels outside the
-!    viewport).  The viewport is centered on the 8.5 by 11 inch page, and 
-!    its boundary is drawn.  1.0 <= PLTSIZ <= 8.5.
-!
-!    Input, real ( kind = 8 ) ELAT, ELON, the latitude and longitude 
-!    (in degrees) of the center of projection E (the center of the plot).
-!    The projection plane is the plane that contains the origin and has 
-!    E as unit normal.  In a rotated coordinate system for which E is 
-!    the north pole, the projection plane contains the equator, and only
-!    northern hemisphere nodes are visible (from the point at infinity in 
-!    the direction E).  These are projected orthogonally onto the 
-!    projection plane (by zeroing the z-component in the rotated coordinate
-!    system).  ELAT and ELON must be in the range -90 to 90 and -180 to 
-!    180, respectively.
-!
-!    Input, real ( kind = 8 ) A, the angular distance in degrees from E 
-!    to the boundary of a circular window against which the triangulation
-!    is clipped.  The projected window is a disk of radius R = Sin(A) 
-!    centered at the origin, and only visible nodes whose projections are 
-!    within distance R of the origin are included in the plot.  Thus, if 
-!    A = 90, the plot includes the entire hemisphere centered at E.  
-!    0 < A <= 90.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N). the coordinates of the 
-!    nodes (unit vectors).
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the 
-!    data structure defining the triangulation, created by TRMESH.
-!
-!    Input, character ( len = * ) TITLE, a string to be centered above the 
-!    plot.  The string must be enclosed in parentheses; i.e., the first and 
-!    last characters must be '(' and ')', respectively, but these are not
-!    displayed.  TITLE may have at most 80 characters including the parentheses.
-!
-!    Input, logical NUMBR, option indicator:  If NUMBR = TRUE, the
-!    nodal indexes are plotted next to the nodes.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if LUN, PLTSIZ, or N is outside its valid range.
-!    2, if ELAT, ELON, or A is outside its valid range.
-!    3, if an error was encountered in writing to unit LUN.
-!
-!  Local parameters:
-!
-!    ANNOT =     Logical variable with value TRUE iff the plot
-!                is to be annotated with the values of ELAT,
-!                ELON, and A
-!    CF =        Conversion factor for degrees to radians
-!    CT =        Cos(ELAT)
-!    EX,EY,EZ =  Cartesian coordinates of the eye-position E
-!    FSIZN =     Font size in points for labeling nodes with
-!                their indexes if NUMBR = TRUE
-!    FSIZT =     Font size in points for the title (and
-!                annotation if ANNOT = TRUE)
-!    IPX1,IPY1 = X and y coordinates (in points) of the lower
-!                  left corner of the bounding box or viewport box
-!    IPX2,IPY2 = X and y coordinates (in points) of the upper
-!                right corner of the bounding box or viewport box
-!    IR =        Half the width (height) of the bounding box or
-!                viewport box in points -- viewport radius
-!    LP =        LIST index (pointer)
-!    LPL =       Pointer to the last neighbor of N0
-!    N0 =        Index of a node whose incident arcs are to be drawn
-!    N1 =        Neighbor of N0
-!    R11...R23 = Components of the first two rows of a rotation
-!                that maps E to the north pole (0,0,1)
-!    SF =        Scale factor for mapping world coordinates
-!                (window coordinates in [-WR,WR] X [-WR,WR])
-!                to viewport coordinates in [IPX1,IPX2] X [IPY1,IPY2]
-!    T =         Temporary variable
-!    TX,TY =     Translation vector for mapping world coordi-
-!                nates to viewport coordinates
-!    WR =        Window radius r = Sin(A)
-!    WRS =       WR**2
-!    X0,Y0,Z0 =  Coordinates of N0 in the rotated coordinate
-!                system or label location (X0,Y0)
-!    X1,Y1,Z1 =  Coordinates of N1 in the rotated coordinate
-!                system or intersection of edge N0-N1 with
-!                the equator (in the rotated coordinate system)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) a
-  logical, parameter :: annot = .true.
-  real    ( kind = 8 ) cf
-  real    ( kind = 8 ) ct
-  real    ( kind = 8 ) elat
-  real    ( kind = 8 ) elon
-  real    ( kind = 8 ) ex
-  real    ( kind = 8 ) ey
-  real    ( kind = 8 ) ez
-  real    ( kind = 8 ), parameter :: fsizn = 10.0D+00
-  real    ( kind = 8 ), parameter :: fsizt = 16.0D+00
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ipx1
-  integer ( kind = 4 ) ipx2
-  integer ( kind = 4 ) ipy1
-  integer ( kind = 4 ) ipy2
-  integer ( kind = 4 ) ir
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lun
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  logical numbr
-  real    ( kind = 8 ) pltsiz
-  real    ( kind = 8 ) r11
-  real    ( kind = 8 ) r12
-  real    ( kind = 8 ) r21
-  real    ( kind = 8 ) r22
-  real    ( kind = 8 ) r23
-  real    ( kind = 8 ) sf
-  real    ( kind = 8 ) t
-  character ( len = * ) title
-  real    ( kind = 8 ) tx
-  real    ( kind = 8 ) ty
-  real    ( kind = 8 ) wr
-  real    ( kind = 8 ) wrs
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-
-  ier = 0
-!
-!  Test for invalid parameters.
-!
-  if ( lun < 0 ) then
-    ier = 1
-    return
-  end if
-
-  if ( 99 < lun ) then
-    ier = 1
-    return
-  end if
-
-  if ( pltsiz < 1.0D+00 ) then
-    ier = 1
-    return
-  else if ( 8.5D+00 < pltsiz ) then
-    ier = 1
-    return
-  else if ( n < 3 ) then
-    ier = 1
-    return
-  end if
-
-  if ( 90.0D+00 < abs ( elat ) ) then
-    ier = 2
-    return
-  else if ( 180.0D+00 < abs ( elon ) ) then
-    ier = 2
-    return
-  else if ( 90.0D+00 < a ) then
-    ier = 2
-    return
-  end if
-!
-!  Compute a conversion factor CF for degrees to radians.
-!
-  cf = atan ( 1.0D+00 ) / 45.0D+00
-!
-!  Compute the window radius WR.
-!
-  wr = sin ( cf * a )
-  wrs = wr * wr
-!
-!  Compute the lower left (IPX1,IPY1) and upper right
-!  (IPX2,IPY2) corner coordinates of the bounding box.
-!  The coordinates, specified in default user space units
-!  (points, at 72 points/inch with origin at the lower
-!  left corner of the page), are chosen to preserve the
-!  square aspect ratio, and to center the plot on the 8.5
-!  by 11 inch page.  The center of the page is (306,396),
-!  and IR = PLTSIZ/2 in points.
-!
-  ir = nint ( 36.0D+00 * pltsiz )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Output header comments.
-!
-  write ( lun, '(a)' ) '%!ps-adobe-3.0 epsf-3.0'
-  write ( lun, '(a,4i4)' ) '%%BoundingBox:', ipx1, ipy1, ipx2, ipy2
-  write ( lun, '(a)' ) '%%title:  Triangulation'
-  write ( lun, '(a)' ) '%%creator:  STRIPACK.F90'
-  write ( lun, '(a)' ) '%%endcomments'
-!
-!  Set (IPX1,IPY1) and (IPX2,IPY2) to the corner coordinates
-!  of a viewport box obtained by shrinking the bounding box
-!  by 12% in each dimension.
-!
-  ir = nint ( 0.88D+00 * real ( ir, kind = 8 ) )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Set the line thickness to 2 points, and draw the
-!  viewport boundary.
-!
-  t = 2.0D+00
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-  write ( lun, '(a,i3,a)' ) '306 396 ', ir, ' 0 360 arc'
-  write ( lun, '(a)' ) 'stroke'
-!
-!  Set up an affine mapping from the window box [-WR,WR] X
-!  [-WR,WR] to the viewport box.
-!
-  sf = real ( ir, kind = 8 ) / wr
-  tx = ipx1 + sf * wr
-  ty = ipy1 + sf * wr
-  write ( lun, '(2f12.6,a)' ) tx, ty, ' translate'
-  write ( lun, '(2f12.6,a)' ) sf, sf, ' scale'
-!
-!  The line thickness must be changed to reflect the new
-!  scaling which is applied to all subsequent output.
-!  Set it to 1.0 point.
-!
-  t = 1.0D+00 / sf
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-!
-!  Save the current graphics state, and set the clip path to
-!  the boundary of the window.
-!
-  write ( lun, '(a)' ) 'gsave'
-  write ( lun, '(a,f12.6,a)' ) '0 0 ', wr, ' 0 360 arc'
-  write ( lun, '(a)' ) 'clip newpath'
-!
-!  Compute the Cartesian coordinates of E and the components
-!  of a rotation R which maps E to the north pole (0,0,1).
-!  R is taken to be a rotation about the z-axis (into the
-!  yz-plane) followed by a rotation about the x-axis chosen
-!  so that the view-up direction is (0,0,1), or (-1,0,0) if
-!  E is the north or south pole.
-!
-!           ( R11  R12  0   )
-!       R = ( R21  R22  R23 )
-!           ( EX   EY   EZ  )
-!
-  t = cf * elon
-  ct = cos ( cf * elat )
-  ex = ct * cos ( t )
-  ey = ct * sin ( t )
-  ez = sin ( cf * elat )
-
-  if ( ct /= 0.0D+00 ) then
-    r11 = -ey / ct
-    r12 = ex / ct
-  else
-    r11 = 0.0D+00
-    r12 = 1.0D+00
-  end if
-
-  r21 = -ez * r12
-  r22 = ez * r11
-  r23 = ct
-!
-!  Loop on visible nodes N0 that project to points (X0,Y0) in the window.
-!
-  do n0 = 1, n
-
-    z0 = ex * x(n0) + ey * y(n0) + ez * z(n0)
-
-    if ( z0 < 0.0D+00 ) then
-      cycle
-    end if
-
-    x0 = r11 * x(n0) + r12 * y(n0)
-    y0 = r21 * x(n0) + r22 * y(n0) + r23 * z(n0)
-
-    if ( wrs < x0 * x0 + y0 * y0 ) then
-      cycle
-    end if
-
-    lpl = lend(n0)
-    lp = lpl
-!
-!  Loop on neighbors N1 of N0.  LPL points to the last
-!  neighbor of N0.  Copy the components of N1 into P.
-!
-    do
-
-      lp = lptr(lp)
-      n1 = abs ( list(lp) )
-
-      x1 = r11 * x(n1) + r12 * y(n1)
-      y1 = r21 * x(n1) + r22 * y(n1) + r23 * z(n1)
-      z1 = ex  * x(n1) + ey  * y(n1) + ez  * z(n1)
-!
-!  N1 is a 'southern hemisphere' point.  Move it to the
-!  intersection of edge N0-N1 with the equator so that
-!  the edge is clipped properly.  Z1 is implicitly set
-!  to 0.
-!
-      if ( z1 < 0.0D+00 ) then
-        x1 = z0 * x1 - z1 * x0
-        y1 = z0 * y1 - z1 * y0
-        t = sqrt ( x1 * x1 + y1 * y1 )
-        x1 = x1 / t
-        y1 = y1 / t
-      end if
-!
-!  If node N1 is in the window and N1 < N0, bypass edge
-!  N0->N1 (since edge N1->N0 has already been drawn).
-!
-!  Add the edge to the path.
-!
-      if ( z1 < 0.0D+00 .or. &
-           wrs < x1 * x1 + y1 * y1 .or. &
-           n0 <= n1 ) then
-
-        write ( lun, '(2f12.6,a,2f12.6,a)' ) &
-          x0, y0, ' moveto', x1, y1, ' lineto'
-
-      end if
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-!
-!  Paint the path and restore the saved graphics state (with
-!  no clip path).
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'grestore'
-
-  if ( numbr ) then
-!
-!  Nodes in the window are to be labeled with their indexes.
-!  Convert FSIZN from points to world coordinates, and
-!  output the commands to select a font and scale it.
-!
-    t = fsizn / sf
-
-    write ( lun, '(a)' ) '/Helvetica findfont'
-    write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Loop on visible nodes N0 that project to points (X0,Y0) in the window.
-!
-    do n0 = 1, n
-
-      if ( ex * x(n0) + ey * y(n0) + ez * z(n0) < 0.0D+00 ) then
-        cycle
-      end if
-
-      x0 = r11 * x(n0) + r12 * y(n0)
-      y0 = r21 * x(n0) + r22 * y(n0) + r23 * z(n0)
-
-      if ( wrs < x0 * x0 + y0 * y0 ) then
-        cycle
-      end if
-!
-!  Move to (X0,Y0) and draw the label N0.  The first char-
-!  acter will will have its lower left corner about one
-!  character width to the right of the nodal position.
-!
-      write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-      write ( lun, '(a,i3,a)' ) '(', n0, ') show'
-
-    end do
-
-  end if
-!
-!  Convert FSIZT from points to world coordinates, and output
-!  the commands to select a font and scale it.
-!
-  t = fsizt / sf
-  write ( lun, '(a)' ) '/Helvetica findfont'
-  write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Display TITLE centered above the plot:
-!
-  y0 = wr + 3.0D+00 * t
-
-  write ( lun, '(a)' ) title
-  write ( lun, '(a,f12.6,a)' ) '  stringwidth pop 2 div neg ', y0, ' moveto'
-  write ( lun, '(a)' ) title
-  write ( lun, '(a)' ) '  show'
-!
-!  Display the window center and radius below the plot.
-!
-  if ( annot ) then
-
-    x0 = -wr
-    y0 = -wr - 50.0D+00 / sf
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f7.2,a,f8.2,a)' ) '(Window center:  Latitude = ', elat, &
-      ', Longitude = ', elon , ') show'
-    y0 = y0 - 2.0D+00 * t
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f5.2,a)' ) '(Angular extent = ', a, ') show'
-
-  end if
-!
-!  Paint the path and output the showpage command and
-!  end-of-file indicator.
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'showpage'
-  write ( lun, '(a)' ) '%%eof'
-
-  ier = 0
-
-  return
-end
-subroutine trprnt ( n, x, y, z, iflag, list, lptr, lend )
-
-!*****************************************************************************80
-!
-!! TRPRNT prints the triangulation adjacency lists.
-!
-!  Discussion:
-!
-!    This subroutine prints the triangulation adjacency lists
-!    created by TRMESH and, optionally, the nodal
-!    coordinates (either latitude and longitude or Cartesian
-!    coordinates) on logical unit LOUT.  The list of neighbors
-!    of a boundary node is followed by index 0.  The numbers of
-!    boundary nodes, triangles, and arcs are also printed.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N = Number of nodes in the triangulation.  
-!    3 <= N and N <= 9999.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the Cartesian coordinates of 
-!    the nodes if IFLAG = 0, or (X and Y only) containing longitude and
-!    latitude, respectively, if 0  < IFLAG, or unused dummy parameters if
-!    IFLAG < 0.
-!
-!    Input, integer ( kind = 4 ) IFLAG = Nodal coordinate option indicator:
-!    = 0 if X, Y, and Z (assumed to contain Cartesian coordinates) are to be
-!      printed (to 6 decimal places).
-!    > 0 if only X and Y (assumed to contain longitude and latitude) are
-!      to be printed (to 6 decimal places).
-!    < 0 if only the adjacency lists are to be printed.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the 
-!    data structure defining the triangulation.  Refer to TRMESH.
-!
-!  Local parameters:
-!
-!    I =     NABOR index (1 to K)
-!    INC =   Increment for NL associated with an adjacency list
-!    K =     Counter and number of neighbors of NODE
-!    LP =    LIST pointer of a neighbor of NODE
-!    LPL =   Pointer to the last neighbor of NODE
-!    NA =    Number of arcs in the triangulation
-!    NABOR = Array containing the adjacency list associated
-!            with NODE, with zero appended if NODE is a boundary node
-!    NB =    Number of boundary nodes encountered
-!    ND =    Index of a neighbor of NODE (or negative index)
-!    NL =    Number of lines that have been printed on the current page
-!    NLMAX = Maximum number of print lines per page (except
-!            for the last page which may have two additional lines)
-!    NMAX =  Upper bound on N (allows 4-digit indexes)
-!    NODE =  Index of a node and DO-loop index (1 to N)
-!    NN =    Local copy of N
-!    NT =    Number of triangles in the triangulation
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) iflag
-  integer ( kind = 4 ) inc
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) na
-  integer ( kind = 4 ) nabor(400)
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nd
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ), parameter :: nlmax = 58
-  integer ( kind = 4 ), parameter :: nmax = 9999
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) node
-  integer ( kind = 4 ) nt
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nn = n
-!
-!  Print a heading and test the range of N.
-!
-  write (*,100) nn
-
-  if ( nn < 3 .or. nmax < nn ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TRPRNT - Fatal error!'
-    write ( *, '(a)' ) '  N is outside its valid range.'
-    return
-  end if
-!
-!  Initialize NL (the number of lines printed on the current
-!  page) and NB (the number of boundary nodes encountered).
-!
-  nl = 6
-  nb = 0
-!
-!  Print LIST only.  K is the number of neighbors of NODE
-!  that have been stored in NABOR.
-!
-  if ( iflag < 0 ) then
-
-    write (*,101)
-
-    do node = 1, nn
-
-      lpl = lend(node)
-      lp = lpl
-      k = 0
-
-      do
-
-        k = k + 1
-        lp = lptr(lp)
-        nd = list(lp)
-        nabor(k) = nd
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-!
-!  NODE is a boundary node.  Correct the sign of the last
-!  neighbor, add 0 to the end of the list, and increment NB.
-!
-      if ( nd <= 0 ) then
-        nabor(k) = -nd
-        k = k + 1
-        nabor(k) = 0
-        nb = nb + 1
-
-      end if
-!
-!  Increment NL and print the list of neighbors.
-!
-      inc = ( k - 1 ) / 14 + 2
-      nl = nl + inc
-
-      if ( nlmax < nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = inc
-      end if
-
-      write (*,104) node, nabor(1:k)
-      if ( k /= 14 ) then
-        write ( *, '(a)' ) ' '
-      end if
-
-    end do
-
-  else if ( 0 < iflag ) then
-!
-!  Print X (longitude), Y (latitude), and LIST.
-!
-    write (*,102)
-
-    do node = 1, nn
-
-      lpl = lend(node)
-      lp = lpl
-      k = 0
-
-      do
-
-        k = k + 1
-        lp = lptr(lp)
-        nd = list(lp)
-        nabor(k) = nd
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-
-      if ( nd <= 0 ) then
-!
-!  NODE is a boundary node.
-!
-        nabor(k) = -nd
-        k = k + 1
-        nabor(k) = 0
-        nb = nb + 1
-      end if
-!
-!  Increment NL and print X, Y, and NABOR.
-!
-      inc = ( k - 1 ) / 8 + 2
-      nl = nl + inc
-
-      if ( nlmax < nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = inc
-      end if
-
-      write (*,105) node, x(node), y(node), nabor(1:k)
-
-      if ( k /= 8 ) then
-        write ( *, '(a)' ) ' '
-      end if
-
-    end do
-
-  else
-!
-!  Print X, Y, Z, and LIST.
-!
-    write (*,103)
-
-    do node = 1, nn
-
-      lpl = lend(node)
-      lp = lpl
-      k = 0
-
-      do
-
-        k = k + 1
-        lp = lptr(lp)
-        nd = list(lp)
-        nabor(k) = nd
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-!
-!  NODE is a boundary node.
-!
-      if ( nd <= 0 ) then
-        nabor(k) = -nd
-        k = k + 1
-        nabor(k) = 0
-        nb = nb + 1
-      end if
-!
-!  Increment NL and print X, Y, Z, and NABOR.
-!
-      inc = ( k - 1 ) / 5 + 2
-      nl = nl + inc
-
-      if ( nlmax < nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = inc
-      end if
-
-      write (*,106) node, x(node), y(node), z(node), nabor(1:k)
-
-      if ( k /= 5 ) then
-        write ( *, '(a)' ) ' '
-      end if
-
-    end do
-
-  end if
-!
-!  Print NB, NA, and NT (boundary nodes, arcs, and triangles).
-!
-  if ( nb /= 0 ) then
-    na = 3 * nn - nb - 3
-    nt = 2 * nn - nb - 2
-  else
-    na = 3 * nn - 6
-    nt = 2 * nn - 4
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8,a)' ) '  NB = ', nb, ' boundary arcs.'
-  write ( *, '(a,i8,a)' ) '  NA = ', na, ' arcs.'
-  write ( *, '(a,i8,a)' ) '  NT = ', nt, ' triangles.'
-
-  return
-!
-!  Print formats:
-!
-  100 format (///15x,'STRIPACK triangulation data ', &
-          'structure,  n = ',i5//)
-  101 format (' node',31x,'neighbors of node'//)
-  102 format (' Node    Longitude      Latitude', &
-          18x,'neighbors of node'//)
-  103 format (' node     x(node)        y(node)',8x, &
-          'z(node)',11x,'neighbors of node'//)
-  104 format (i5,4x,14i5/(1x,8x,14i5))
-  105 format (i5,2e15.6,4x,8i5/(1x,38x,8i5))
-  106 format (i5,3e15.6,4x,5i5/(1x,53x,5i5))
-end
-subroutine voronoi_poly_count ( n, lend, lptr, listc )
-
-!*****************************************************************************80
-!
-!! VORONOI_POLY_COUNT counts the polygons of each size in the Voronoi diagram.
-!
-!  Modified:
-!
-!    06 June 2002
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of Voronoi polygons.
-!
-!    Input, integer ( kind = 4 ) LEND(N), some kind of pointer.
-!
-!    Input, integer ( kind = 4 ) LPTR(6*(N-2)), some other kind of pointer.
-!
-!    Input, integer ( kind = 4 ) LISTC(6*(N-2)), some other kind of pointer.
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ), parameter :: side_max = 20
-
-  integer ( kind = 4 ) count(side_max)
-  integer ( kind = 4 ) edges
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) kv
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) listc(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) sides
-  integer ( kind = 4 ) vertices
-
-  count(1:side_max) = 0
-
-  edges = 0
-  vertices = 0
-
-  do n0 = 1, n
-
-    lpl = lend(n0)
-
-    lp = lpl
-
-    sides = 0
-
-    do
-
-      lp = lptr(lp)
-      kv = listc(lp)
-
-      vertices = max ( vertices, kv )
-      sides = sides + 1
-      edges = edges + 1
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-    if ( 0 < sides .and. sides < side_max ) then
-      count(sides) = count(sides) + 1
-    else
-      count(side_max) = count(side_max) + 1
-    end if
-
-  end do
-
-  edges = edges / 2
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'VORONOI_POLY_COUNT'
-  write ( *, '(a)' ) '  Number of polygons of each shape.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Faces =    ', n
-  write ( *, '(a,i8)' ) '  Vertices = ', vertices
-  write ( *, '(a,i8)' ) '  Edges =    ', edges
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  F+V-E-2 =  ', n + vertices - edges - 2
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) ' Sides  Number'
-  write ( *, '(a)' ) ' '
-
-  do i = 1, side_max - 1
-    if ( count(i) /= 0 ) then
-      write ( *, '(2x,i8,2x,i8)' ) i, count(i)
-    end if
-  end do
-
-  if ( count(side_max) /= 0 ) then
-    write ( *, '(2x,i8,2x,i8)' ) side_max, count(side_max)
-  end if
-
-
-  return
-end
-subroutine vrplot ( lun, pltsiz, elat, elon, a, n, x, y, z, nt, listc, lptr, &
-  lend, xc, yc, zc, title, numbr, ier )
-
-!*****************************************************************************80
-!
-!! VRPLOT makes a PostScript image of a Voronoi diagram on the unit sphere.
-!
-!  Discussion:
-!
-!    This subroutine creates a level-2 Encapsulated Postscript
-!    (EPS) file containing a graphical depiction of a
-!    Voronoi diagram of a set of nodes on the unit sphere.
-!    The visible vertices are projected onto the plane that
-!    contains the origin and has normal defined by a user-
-!    specified eye-position.  Projections of adjacent (visible)
-!    Voronoi vertices are connected by line segments.
-!
-!    The parameters defining the Voronoi diagram may be computed by 
-!    subroutine CRLIST.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LUN, the logical unit number in the range 0
-!    to 99.  The unit should be opened with an appropriate
-!    file name before the call to this routine.
-!
-!    Input, real ( kind = 8 ) PLTSIZ, the plot size in inches.  A circular
-!    window in the projection plane is mapped to a circular viewport with
-!    diameter equal to .88*PLTSIZ (leaving room for labels outside the
-!    viewport).  The viewport is centered on the 8.5 by 11 inch page, and its
-!    boundary is drawn.  1.0 <= PLTSIZ <= 8.5.
-!
-!    Input, real ( kind = 8 ) ELAT, ELON, the latitude and longitude (in
-!    degrees) of the center of projection E (the center of the plot).  The
-!    projection plane is the plane that contains the origin and has E as unit
-!    normal.  In a rotated coordinate system for which E is the north pole, the
-!    projection plane contains the equator, and only northern hemisphere 
-!    points are visible (from the point at infinity in the direction E).
-!    These are projected orthogonally onto the projection plane (by zeroing 
-!    the z-component in the rotated coordinate system).  ELAT and ELON must 
-!    be in the range -90 to 90 and -180 to 180, respectively.
-!
-!    Input, real ( kind = 8 ) A, the angular distance in degrees from E to the
-!    boundary of a circular window against which the Voronoi diagram is clipped.
-!    The projected window is a disk of radius R = Sin(A) centered at the 
-!    origin, and only visible vertices whose projections are within distance 
-!    R of the origin are included in the plot.  Thus, if A = 90, the plot
-!    includes the entire hemisphere centered at E.  0 < A <= 90.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes (Voronoi centers) and
-!    Voronoi regions.  3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes
-!    (unit vectors).
-!
-!    Input, integer ( kind = 4 ) NT, the number of Voronoi region vertices 
-!    (triangles, including those in the extended triangulation if the number 
-!    of boundary nodes NB is nonzero): NT = 2*N-4.
-!
-!    Input, integer ( kind = 4 ) LISTC(3*NT), containing triangle indexes 
-!    (indexes to XC, YC, and ZC) stored in 1-1 correspondence with LIST/LPTR 
-!    entries (or entries that would be stored in LIST for the extended 
-!    triangulation): the index of triangle (N1,N2,N3) is stored in LISTC(K),
-!    LISTC(L), and LISTC(M), where LIST(K), LIST(L), and LIST(M) are the 
-!    indexes of N2 as a neighbor of N1, N3 as a neighbor of N2, and N1 as a
-!    neighbor of N3.  The Voronoi region associated with a node is defined by
-!    the CCW-ordered sequence of circumcenters in one-to-one correspondence 
-!    with its adjacency list (in the extended triangulation).
-!
-!    Input, integer ( kind = 4 ) LPTR(3*NT), where NT = 2*N-4, containing a
-!    set of pointers (LISTC indexes) in one-to-one correspondence with the 
-!    elements of LISTC.  LISTC(LPTR(I)) indexes the triangle which follows 
-!    LISTC(I) in cyclical counterclockwise order (the first neighbor follows
-!    the last neighbor).
-!
-!    Input, integer ( kind = 4 ) LEND(N), a set of pointers to triangle lists.
-!    LP = LEND(K) points to a triangle (indexed by LISTC(LP)) containing node 
-!    K for K = 1 to N.
-!
-!    Input, real ( kind = 8 ) XC(NT), YC(NT), ZC(NT), the coordinates of the
-!    triangle circumcenters (Voronoi vertices). 
-!    XC(I)**2 + YC(I)**2 + ZC(I)**2 = 1.
-!
-!    Input, character ( len = * ) TITLE, a string to be centered above the plot.
-!    The string must be enclosed in parentheses; i.e., the first and last
-!    characters must be '(' and ')', respectively, but these are not
-!    displayed.  TITLE may have at most 80 characters including the parentheses.
-!
-!    Input, logical NUMBR, option indicator:  If NUMBR = TRUE, the nodal 
-!    indexes are plotted at the Voronoi region centers.
-!
-!    Output, integer ( kind = 4 ) IER = Error indicator:
-!    0, if no errors were encountered.
-!    1, if LUN, PLTSIZ, N, or NT is outside its valid range.
-!    2, if ELAT, ELON, or A is outside its valid range.
-!    3, if an error was encountered in writing to unit LUN.
-!
-!  Local parameters:
-!
-!    ANNOT =     Logical variable with value TRUE iff the plot
-!                is to be annotated with the values of ELAT, ELON, and A
-!    CF =        Conversion factor for degrees to radians
-!    CT =        Cos(ELAT)
-!    EX,EY,EZ =  Cartesian coordinates of the eye-position E
-!    FSIZN =     Font size in points for labeling nodes with
-!                their indexes if NUMBR = TRUE
-!    FSIZT =     Font size in points for the title (and
-!                annotation if ANNOT = TRUE)
-!    IN1,IN2 =   Logical variables with value TRUE iff the
-!                projections of vertices KV1 and KV2, respec-
-!                tively, are inside the window
-!    IPX1,IPY1 = X and y coordinates (in points) of the lower
-!                left corner of the bounding box or viewport box
-!    IPX2,IPY2 = X and y coordinates (in points) of the upper
-!                right corner of the bounding box or viewport box
-!    IR =        Half the width (height) of the bounding box or
-!                viewport box in points -- viewport radius
-!    KV1,KV2 =   Endpoint indexes of a Voronoi edge
-!    LP =        LIST index (pointer)
-!    LPL =       Pointer to the last neighbor of N0
-!    N0 =        Index of a node
-!    R11...R23 = Components of the first two rows of a rotation
-!                that maps E to the north pole (0,0,1)
-!    SF =        Scale factor for mapping world coordinates
-!                (window coordinates in [-WR,WR] X [-WR,WR])
-!                to viewport coordinates in [IPX1,IPX2] X [IPY1,IPY2]
-!    T =         Temporary variable
-!    TX,TY =     Translation vector for mapping world coordi-
-!                nates to viewport coordinates
-!    WR =        Window radius r = Sin(A)
-!    WRS =       WR**2
-!    X0,Y0 =     Projection plane coordinates of node N0 or label location
-!    X1,Y1,Z1 =  Coordinates of vertex KV1 in the rotated coordinate system
-!    X2,Y2,Z2 =  Coordinates of vertex KV2 in the rotated
-!                coordinate system or intersection of edge
-!                KV1-KV2 with the equator (in the rotated coordinate system)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) nt
-
-  real    ( kind = 8 ) a
-  logical, parameter :: annot = .true.
-  real    ( kind = 8 ) cf
-  real    ( kind = 8 ) ct
-  real    ( kind = 8 ) elat
-  real    ( kind = 8 ) elon
-  real    ( kind = 8 ) ex
-  real    ( kind = 8 ) ey
-  real    ( kind = 8 ) ez
-  real    ( kind = 8 ), parameter :: fsizn = 10.0D+00
-  real    ( kind = 8 ), parameter :: fsizt = 16.0D+00
-  integer ( kind = 4 ) ier
-  logical in1
-  logical in2
-  integer ( kind = 4 ) ipx1
-  integer ( kind = 4 ) ipx2
-  integer ( kind = 4 ) ipy1
-  integer ( kind = 4 ) ipy2
-  integer ( kind = 4 ) ir
-  integer ( kind = 4 ) kv1
-  integer ( kind = 4 ) kv2
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) listc(3*nt)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lun
-  integer ( kind = 4 ) n0
-  logical              numbr
-  real    ( kind = 8 ) pltsiz
-  real    ( kind = 8 ) r11
-  real    ( kind = 8 ) r12
-  real    ( kind = 8 ) r21
-  real    ( kind = 8 ) r22
-  real    ( kind = 8 ) r23
-  real    ( kind = 8 ) sf
-  real    ( kind = 8 ) t
-  character ( len = * ) title
-  real    ( kind = 8 ) tx
-  real    ( kind = 8 ) ty
-  real    ( kind = 8 ) wr
-  real    ( kind = 8 ) wrs
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) xc(nt)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) yc(nt)
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-  real    ( kind = 8 ) zc(nt)
-
-  ier = 0
-!
-!  Test for invalid parameters.
-!
-  if ( lun < 0 ) then
-    ier = 1
-    return
-  end if
-
-  if ( 99 < lun ) then
-    ier = 1
-    return
-  end if
-
-  if ( pltsiz < 1.0D+00 .or. 8.5D+00 < pltsiz .or. &
-      n < 3 .or. nt /= 2*n-4) then
-    ier = 1
-    return
-  end if
-
-  if ( 90.0D+00 < abs ( elat ) .or. &
-       180.0D+00 < abs ( elon ) .or. &
-       90.0D+00 < a ) then
-    ier = 2
-    return
-  end if
-!
-!  Compute a conversion factor CF for degrees to radians.
-!
-  cf = atan ( 1.0D+00 ) / 45.0D+00
-!
-!  Compute the window radius WR.
-!
-  wr = sin ( cf * a )
-  wrs = wr * wr
-!
-!  Compute the lower left (IPX1,IPY1) and upper right
-!  (IPX2,IPY2) corner coordinates of the bounding box.
-!  The coordinates, specified in default user space units
-!  (points, at 72 points/inch with origin at the lower
-!  left corner of the page), are chosen to preserve the
-!  square aspect ratio, and to center the plot on the 8.5
-!  by 11 inch page.  The center of the page is (306,396),
-!  and IR = PLTSIZ/2 in points.
-!
-  ir = nint ( 36.0D+00 * pltsiz )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Output header comments.
-!
-  write ( lun, '(a)' ) '%!ps-adobe-3.0 epsf-3.0'
-  write ( lun, '(a,4i4)' ) '%%BoundingBox: ', ipx1, ipy1, ipx2, ipy2
-  write ( lun, '(a)' ) '%%title:  Voronoi diagram'
-  write ( lun, '(a)' ) '%%creator:  STRIPACK.F90'
-  write ( lun, '(a)' ) '%%endcomments'
-!
-!  Set (IPX1,IPY1) and (IPX2,IPY2) to the corner coordinates
-!  of a viewport box obtained by shrinking the bounding box
-!  by 12% in each dimension.
-!
-  ir = nint ( 0.88D+00 * real ( ir, kind = 8 ) )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Set the line thickness to 2 points, and draw the viewport boundary.
-!
-  t = 2.0D+00
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-  write ( lun, '(a,i3,a)' ) '306 396 ', ir, ' 0 360 arc'
-  write ( lun, '(a)' ) 'stroke'
-!
-!  Set up an affine mapping from the window box [-WR,WR] X
-!  [-WR,WR] to the viewport box.
-!
-  sf = real ( ir, kind = 8 ) / wr
-  tx = ipx1 + sf * wr
-  ty = ipy1 + sf * wr
-
-  write ( lun, '(2f12.6,a)' ) tx, ty, ' translate'
-  write ( lun, '(2f12.6,a)' ) sf, sf, ' scale'
-!
-!  The line thickness must be changed to reflect the new
-!  scaling which is applied to all subsequent output.
-!  Set it to 1.0 point.
-!
-  t = 1.0D+00 / sf
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-!
-!  Save the current graphics state, and set the clip path to
-!  the boundary of the window.
-!
-  write ( lun, '(a)' ) 'gsave'
-  write ( lun, '(a,f12.6,a)' ) '0 0 ', wr, ' 0 360 arc'
-  write ( lun, '(a)' ) 'clip newpath'
-!
-!  Compute the Cartesian coordinates of E and the components
-!  of a rotation R which maps E to the north pole (0,0,1).
-!  R is taken to be a rotation about the z-axis (into the
-!  yz-plane) followed by a rotation about the x-axis chosen
-!  so that the view-up direction is (0,0,1), or (-1,0,0) if
-!  E is the north or south pole.
-!
-!           ( R11  R12  0   )
-!       R = ( R21  R22  R23 )
-!           ( EX   EY   EZ  )
-!
-  t = cf * elon
-  ct = cos ( cf * elat )
-  ex = ct * cos ( t )
-  ey = ct * sin ( t )
-  ez = sin ( cf * elat )
-
-  if ( ct /= 0.0D+00 ) then
-    r11 = -ey / ct
-    r12 = ex / ct
-  else
-    r11 = 0.0D+00
-    r12 = 1.0D+00
-  end if
-
-  r21 = -ez * r12
-  r22 = ez * r11
-  r23 = ct
-!
-!  Loop on nodes (Voronoi centers) N0.
-!  LPL indexes the last neighbor of N0.
-!
-  do n0 = 1, n
-
-    lpl = lend(n0)
-!
-!  Set KV2 to the first (and last) vertex index and compute
-!  its coordinates (X2,Y2,Z2) in the rotated coordinate system.
-!
-    kv2 = listc(lpl)
-    x2 = r11 * xc(kv2) + r12 * yc(kv2)
-    y2 = r21 * xc(kv2) + r22 * yc(kv2) + r23 * zc(kv2)
-    z2 = ex * xc(kv2) + ey * yc(kv2) + ez * zc(kv2)
-!
-!  IN2 = TRUE iff KV2 is in the window.
-!
-    in2 = ( 0.0D+00 <= z2 ) .and. ( x2 * x2 + y2 * y2 <= wrs )
-!
-!  Loop on neighbors N1 of N0.  For each triangulation edge
-!  N0-N1, KV1-KV2 is the corresponding Voronoi edge.
-!
-    lp = lpl
-
-    do
-
-      lp = lptr(lp)
-      kv1 = kv2
-      x1 = x2
-      y1 = y2
-      z1 = z2
-      in1 = in2
-      kv2 = listc(lp)
-!
-!  Compute the new values of (X2,Y2,Z2) and IN2.
-!
-      x2 = r11 * xc(kv2) + r12 * yc(kv2)
-      y2 = r21 * xc(kv2) + r22 * yc(kv2) + r23 * zc(kv2)
-      z2 = ex * xc(kv2) + ey * yc(kv2) + ez * zc(kv2)
-      in2 = 0.0D+00 <= z2 .and. x2 * x2 + y2 * y2 <= wrs
-!
-!  Add edge KV1-KV2 to the path iff both endpoints are inside
-!  the window and KV1 < KV2, or KV1 is inside and KV2 is
-!  outside (so that the edge is drawn only once).
-!
-      if ( in1 .and. ( .not. in2 .or. kv1 < kv2 ) ) then
-!
-!  If KV2 is a 'southern hemisphere' point, move it to the
-!  intersection of edge KV1-KV2 with the equator so that
-!  the edge is clipped properly.  Z2 is implicitly set to 0.
-!
-        if ( z2 < 0.0D+00 ) then
-          x2 = z1 * x2 - z2 * x1
-          y2 = z1 * y2 - z2 * y1
-          t = sqrt ( x2 * x2 + y2 * y2 )
-          x2 = x2 / t
-          y2 = y2 / t
-        end if
-
-        write ( lun, '(2f12.6,a,2f12.6,a)' ) &
-          x1, y1, ' moveto', x2, y2, ' lineto'
-
-      end if
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-!
-!  Paint the path and restore the saved graphics state (with no clip path).
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'grestore'
-
-  if ( numbr ) then
-!
-!  Nodes in the window are to be labeled with their indexes.
-!  Convert FSIZN from points to world coordinates, and
-!  output the commands to select a font and scale it.
-!
-    t = fsizn / sf
-    write ( lun, '(a)' ) '/Helvetica findfont'
-    write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Loop on visible nodes N0 that project to points (X0,Y0) in
-!  the window.
-!
-    do n0 = 1, n
-
-      if ( ex * x(n0) + ey * y(n0) + ez * z(n0) < 0.0D+00 ) then
-        cycle
-      end if
-
-      x0 = r11 * x(n0) + r12 * y(n0)
-      y0 = r21 * x(n0) + r22 * y(n0) + r23 * z(n0)
-!
-!  Move to (X0,Y0), and draw the label N0 with the origin
-!  of the first character at (X0,Y0).
-!
-      if ( x0 * x0 + y0 * y0 <= wrs ) then
-        write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-        write ( lun, '(a,i3,a)' ) '(', n0, ') show'
-      end if
-
-    end do
-
-  end if
-!
-!  Convert FSIZT from points to world coordinates, and output
-!  the commands to select a font and scale it.
-!
-  t = fsizt / sf
-  write ( lun, '(a)' ) '/Helvetica findfont'
-  write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Display TITLE centered above the plot:
-!
-  y0 = wr + 3.0D+00 * t
-  write ( lun, '(a)' ) title
-  write ( lun, '(a,g12.6,a)' ) '  stringwidth pop 2 div neg ', y0, ' moveto'
-  write ( lun, '(a)' ) title
-  write ( lun, '(a)' ) '  show'
-!
-!  Display the window center and radius below the plot.
-!
-  if ( annot ) then
-
-    x0 = -wr
-    y0 = -wr - 50.0D+00 / sf
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f7.2,a,f8.2,a)' ) '(Window center:  Latitude = ', elat, &
-      ', Longitude = ', elon , ') show'
-    y0 = y0 - 2.0D+00 * t
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f5.2,a)' ) '(Angular extent = ', a, ') show'
-
-  end if
-!
-!  Paint the path and output the showpage command and end-of-file indicator.
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'showpage'
-  write ( lun, '(a)' ) '%%eof'
-
-  return
-end
diff --git a/sandbox/stripack/stripack.f90.LB b/sandbox/stripack/stripack.f90.LB
deleted file mode 100644
index 5dd24f8..0000000
--- a/sandbox/stripack/stripack.f90.LB
+++ /dev/null
@@ -1,8474 +0,0 @@
-!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
-!! stripack.f90                                                  Robert Renka !!
-!!
-!! This code is distributed under the ACM Software License Agreement,
-!! see http://www.acm.org/publications/policies/softwarecrnotice
-!!
-!! code modified by Laurent Bartholdi, 20090310
-!! changed ADDNOD and TRMESH so that they return ier rather than
-!! print an error message and stop
-!!
-!! original file at
-!! http://people.sc.fsu.edu/~burkardt/f_src/stripack/stripack.html
-!!
-!! @(#)$Id: stripack.f90,v 1.7 2011/03/25 21:54:56 gap Exp $
-!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!!
-!!
-subroutine addnod ( nst, k, x, y, z, list, lptr, lend, lnew, ier )
-
-!*****************************************************************************80
-!
-!! ADDNOD adds a node to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine adds node K to a triangulation of the
-!    convex hull of nodes 1, ..., K-1, producing a triangulation
-!    of the convex hull of nodes 1, ..., K.
-!
-!    The algorithm consists of the following steps:  node K
-!    is located relative to the triangulation (TRFIND), its
-!    index is added to the data structure (INTADD or BDYADD),
-!    and a sequence of swaps (SWPTST and SWAP) are applied to
-!    the arcs opposite K so that all arcs incident on node K
-!    and opposite node K are locally optimal (satisfy the circumcircle test).
-!
-!    Thus, if a Delaunay triangulation of nodes 1 through K-1 is input,
-!    a Delaunay triangulation of nodes 1 through K will be output.
-!
-!  Modified:
-!
-!    15 May 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) NST, the index of a node at which TRFIND
-!    begins its search.  Search time depends on the proximity of this node to
-!    K.  If NST < 1, the search is begun at node K-1.
-!
-!    Input, integer ( kind = 4 ) K, the nodal index (index for X, Y, Z, and
-!    LEND) of the new node to be added.  4 <= K.
-!
-!    Input, real ( kind = 8 ) X(K), Y(K), Z(K), the coordinates of the nodes.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(K),
-!    LNEW.  On input, the data structure associated with the triangulation of
-!    nodes 1 to K-1.  On output, the data has been updated to include node
-!    K.  The array lengths are assumed to be large enough to add node K.
-!    Refer to TRMESH.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!     0 if no errors were encountered.
-!    -1 if K is outside its valid range on input.
-!    -2 if all nodes (including K) are collinear (lie on a common geodesic).
-!     L if nodes L and K coincide for some L < K.
-!
-!  Local parameters:
-!
-!    B1,B2,B3 = Unnormalized barycentric coordinates returned by TRFIND.
-!    I1,I2,I3 = Vertex indexes of a triangle containing K
-!    IN1 =      Vertex opposite K:  first neighbor of IO2
-!               that precedes IO1.  IN1,IO1,IO2 are in
-!               counterclockwise order.
-!    IO1,IO2 =  Adjacent neighbors of K defining an arc to
-!               be tested for a swap
-!    IST =      Index of node at which TRFIND begins its search
-!    KK =       Local copy of K
-!    KM1 =      K-1
-!    L =        Vertex index (I1, I2, or I3) returned in IER
-!               if node K coincides with a vertex
-!    LP =       LIST pointer
-!    LPF =      LIST pointer to the first neighbor of K
-!    LPO1 =     LIST pointer to IO1
-!    LPO1S =    Saved value of LPO1
-!    P =        Cartesian coordinates of node K
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-
-  real    ( kind = 8 ) b1
-  real    ( kind = 8 ) b2
-  real    ( kind = 8 ) b3
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) in1
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) ist
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) km1
-  integer ( kind = 4 ) l
-  integer ( kind = 4 ) lend(k)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpf
-  integer ( kind = 4 ) lpo1
-  integer ( kind = 4 ) lpo1s
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) nst
-  real    ( kind = 8 ) p(3)
-  logical              swptst
-  real    ( kind = 8 ) x(k)
-  real    ( kind = 8 ) y(k)
-  real    ( kind = 8 ) z(k)
-
-  kk = k
-
-  if ( kk < 4 ) then
-    ier = -1
-    return
-  end if
-!
-!  Initialization:
-!
-  km1 = kk - 1
-  ist = nst
-  if ( ist < 1 ) then
-    ist = km1
-  end if
-
-  p(1) = x(kk)
-  p(2) = y(kk)
-  p(3) = z(kk)
-!
-!  Find a triangle (I1,I2,I3) containing K or the rightmost
-!  (I1) and leftmost (I2) visible boundary nodes as viewed
-!  from node K.
-!
-  call trfind ( ist, p, km1, x, y, z, list, lptr, lend, b1, b2, b3, &
-    i1, i2, i3 )
-!
-!  Test for collinear or duplicate nodes.
-!
-  if ( i1 == 0 ) then
-    ier = -2
-    return
-  end if
-
-  if ( i3 /= 0 ) then
-
-    l = i1
-
-    if ( p(1) == x(l) .and. p(2) == y(l)  .and. p(3) == z(l) ) then
-      ier = l
-      return
-    end if
-
-    l = i2
-
-    if ( p(1) == x(l) .and. p(2) == y(l)  .and. p(3) == z(l) ) then
-      ier = l
-      return
-    end if
-
-    l = i3
-    if ( p(1) == x(l) .and. p(2) == y(l)  .and. p(3) == z(l) ) then
-      ier = l
-      return
-    end if
-
-    call intadd ( kk, i1, i2, i3, list, lptr, lend, lnew )
-
-  else
-
-    if ( i1 /= i2 ) then
-      call bdyadd ( kk, i1,i2, list, lptr, lend, lnew )
-    else
-      call covsph ( kk, i1, list, lptr, lend, lnew )
-    end if
-
-  end if
-
-  ier = 0
-!
-!  Initialize variables for optimization of the triangulation.
-!
-  lp = lend(kk)
-  lpf = lptr(lp)
-  io2 = list(lpf)
-  lpo1 = lptr(lpf)
-  io1 = abs ( list(lpo1) )
-!
-!  Begin loop: find the node opposite K.
-!
-  do
-
-    lp = lstptr ( lend(io1), io2, list, lptr )
-
-    if ( 0 <= list(lp) ) then
-
-      lp = lptr(lp)
-      in1 = abs ( list(lp) )
-!
-!  Swap test:  if a swap occurs, two new arcs are
-!  opposite K and must be tested.
-!
-      lpo1s = lpo1
-
-      if ( .not. swptst ( in1, kk, io1, io2, x, y, z ) ) then
-
-        if ( lpo1 == lpf .or. list(lpo1) < 0 ) then
-          exit
-        end if
-
-        io2 = io1
-        lpo1 = lptr(lpo1)
-        io1 = abs ( list(lpo1) )
-        cycle
-
-      end if
-
-      call swap ( in1, kk, io1, io2, list, lptr, lend, lpo1 )
-!
-!  A swap is not possible because KK and IN1 are already
-!  adjacent.  This error in SWPTST only occurs in the
-!  neutral case and when there are nearly duplicate nodes.
-!
-      if ( lpo1 /= 0 ) then
-        io1 = in1
-        cycle
-      end if
-
-      lpo1 = lpo1s
-
-    end if
-!
-!  No swap occurred.  Test for termination and reset IO2 and IO1.
-!
-    if ( lpo1 == lpf .or. list(lpo1) < 0 ) then
-      exit
-    end if
-
-    io2 = io1
-    lpo1 = lptr(lpo1)
-    io1 = abs ( list(lpo1) )
-
-  end do
-
-  return
-end
-function arc_cosine ( c )
-
-!*****************************************************************************80
-!
-!! ARC_COSINE computes the arc cosine function, with argument truncation.
-!
-!  Discussion:
-!
-!    If you call your system ACOS routine with an input argument that is
-!    outside the range [-1.0, 1.0 ], you may get an unpleasant surprise.
-!    This routine truncates arguments outside the range.
-!
-!  Modified:
-!
-!    02 December 2000
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) C, the argument.
-!
-!    Output, real ( kind = 8 ) ARC_COSINE, an angle whose cosine is C.
-!
-  implicit none
-
-  real    ( kind = 8 ) arc_cosine
-  real    ( kind = 8 ) c
-  real    ( kind = 8 ) c2
-
-  c2 = c
-  c2 = max ( c2, -1.0D+00 )
-  c2 = min ( c2, +1.0D+00 )
-
-  arc_cosine = acos ( c2 )
-
-  return
-end
-function areas ( v1, v2, v3 )
-
-!*****************************************************************************80
-!
-!! AREAS computes the area of a spherical triangle on the unit sphere.
-!
-!  Discussion:
-!
-!    This function returns the area of a spherical triangle
-!    on the unit sphere.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) V1(3), V2(3), V3(3), the Cartesian coordinates
-!    of unit vectors (the three triangle vertices in any order).  These
-!    vectors, if nonzero, are implicitly scaled to have length 1.
-!
-!    Output, real ( kind = 8 ) AREAS, the area of the spherical triangle
-!    defined by V1, V2, and V3, in the range 0 to 2*PI (the area of a
-!    hemisphere).  AREAS = 0 (or 2*PI) if and only if V1, V2, and V3 lie in (or
-!    close to) a plane containing the origin.
-!
-!  Local parameters:
-!
-!    A1,A2,A3 =    Interior angles of the spherical triangle.
-!
-!    CA1,CA2,CA3 = cos(A1), cos(A2), and cos(A3), respectively.
-!
-!    DV1,DV2,DV3 = Double Precision copies of V1, V2, and V3.
-!
-!    I =           DO-loop index and index for Uij.
-!
-!    S12,S23,S31 = Sum of squared components of U12, U23, U31.
-!
-!    U12,U23,U31 = Unit normal vectors to the planes defined by
-!                 pairs of triangle vertices.
-!
-  implicit none
-
-  real    ( kind = 8 ) a1
-  real    ( kind = 8 ) a2
-  real    ( kind = 8 ) a3
-  real    ( kind = 8 ) areas
-  real    ( kind = 8 ) ca1
-  real    ( kind = 8 ) ca2
-  real    ( kind = 8 ) ca3
-  real    ( kind = 8 ) dv1(3)
-  real    ( kind = 8 ) dv2(3)
-  real    ( kind = 8 ) dv3(3)
-  real    ( kind = 8 ) s12
-  real    ( kind = 8 ) s23
-  real    ( kind = 8 ) s31
-  real    ( kind = 8 ) u12(3)
-  real    ( kind = 8 ) u23(3)
-  real    ( kind = 8 ) u31(3)
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) v3(3)
-
-  dv1(1:3) = v1(1:3)
-  dv2(1:3) = v2(1:3)
-  dv3(1:3) = v3(1:3)
-!
-!  Compute cross products Uij = Vi X Vj.
-!
-  u12(1) = dv1(2) * dv2(3) - dv1(3) * dv2(2)
-  u12(2) = dv1(3) * dv2(1) - dv1(1) * dv2(3)
-  u12(3) = dv1(1) * dv2(2) - dv1(2) * dv2(1)
-
-  u23(1) = dv2(2) * dv3(3) - dv2(3) * dv3(2)
-  u23(2) = dv2(3) * dv3(1) - dv2(1) * dv3(3)
-  u23(3) = dv2(1) * dv3(2) - dv2(2) * dv3(1)
-
-  u31(1) = dv3(2) * dv1(3) - dv3(3) * dv1(2)
-  u31(2) = dv3(3) * dv1(1) - dv3(1) * dv1(3)
-  u31(3) = dv3(1) * dv1(2) - dv3(2) * dv1(1)
-!
-!  Normalize Uij to unit vectors.
-!
-  s12 = dot_product ( u12(1:3), u12(1:3) )
-  s23 = dot_product ( u23(1:3), u23(1:3) )
-  s31 = dot_product ( u31(1:3), u31(1:3) )
-!
-!  Test for a degenerate triangle associated with collinear vertices.
-!
-  if ( s12 == 0.0D+00 .or. s23 == 0.0D+00 .or. s31 == 0.0D+00 ) then
-    areas = 0.0D+00
-    return
-  end if
-
-  s12 = sqrt ( s12 )
-  s23 = sqrt ( s23 )
-  s31 = sqrt ( s31 )
-
-  u12(1:3) = u12(1:3) / s12
-  u23(1:3) = u23(1:3) / s23
-  u31(1:3) = u31(1:3) / s31
-!
-!  Compute interior angles Ai as the dihedral angles between planes:
-!  CA1 = cos(A1) = -<U12,U31>
-!  CA2 = cos(A2) = -<U23,U12>
-!  CA3 = cos(A3) = -<U31,U23>
-!
-  ca1 = - dot_product ( u12(1:3), u31(1:3) )
-  ca2 = - dot_product ( u23(1:3), u12(1:3) )
-  ca3 = - dot_product ( u31(1:3), u23(1:3) )
-
-  ca1 = max ( ca1, -1.0D+00 )
-  ca1 = min ( ca1, +1.0D+00 )
-  ca2 = max ( ca2, -1.0D+00 )
-  ca2 = min ( ca2, +1.0D+00 )
-  ca3 = max ( ca3, -1.0D+00 )
-  ca3 = min ( ca3, +1.0D+00 )
-
-  a1 = acos ( ca1 )
-  a2 = acos ( ca2 )
-  a3 = acos ( ca3 )
-!
-!  Compute AREAS = A1 + A2 + A3 - PI.
-!
-  areas = a1 + a2 + a3 - acos ( -1.0D+00 )
-
-  if ( areas < 0.0D+00 ) then
-    areas = 0.0D+00
-  end if
-
-  return
-end
-subroutine bdyadd ( kk, i1, i2, list, lptr, lend, lnew )
-
-!*****************************************************************************80
-!
-!! BDYADD adds a boundary node to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine adds a boundary node to a triangulation
-!    of a set of KK-1 points on the unit sphere.  The data
-!    structure is updated with the insertion of node KK, but no
-!    optimization is performed.
-!
-!    This routine is identical to the similarly named routine
-!    in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) KK, the index of a node to be connected to
-!    the sequence of all visible boundary nodes.  1 <= KK and
-!    KK must not be equal to I1 or I2.
-!
-!    Input, integer ( kind = 4 ) I1, the first (rightmost as viewed from KK)
-!    boundary node in the triangulation that is visible from
-!    node KK (the line segment KK-I1 intersects no arcs.
-!
-!    Input, integer ( kind = 4 ) I2, the last (leftmost) boundary node that
-!    is visible from node KK.  I1 and I2 may be determined by TRFIND.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the triangulation data structure created by TRMESH.
-!    Nodes I1 and I2 must be included
-!    in the triangulation.  On output, the data structure is updated with
-!    the addition of node KK.  Node KK is connected to I1, I2, and
-!    all boundary nodes in between.
-!
-!  Local parameters:
-!
-!    K =     Local copy of KK
-!    LP =    LIST pointer
-!    LSAV =  LIST pointer
-!    N1,N2 = Local copies of I1 and I2, respectively
-!    NEXT =  Boundary node visible from K
-!    NSAV =  Boundary node visible from K
-!
-  implicit none
-
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lsav
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nsav
-
-  k = kk
-  n1 = i1
-  n2 = i2
-!
-!  Add K as the last neighbor of N1.
-!
-  lp = lend(n1)
-  lsav = lptr(lp)
-  lptr(lp) = lnew
-  list(lnew) = -k
-  lptr(lnew) = lsav
-  lend(n1) = lnew
-  lnew = lnew + 1
-  next = -list(lp)
-  list(lp) = next
-  nsav = next
-!
-!  Loop on the remaining boundary nodes between N1 and N2,
-!  adding K as the first neighbor.
-!
-  do
-
-    lp = lend(next)
-    call insert ( k, lp, list, lptr, lnew )
-
-    if ( next == n2 ) then
-      exit
-    end if
-
-    next = -list(lp)
-    list(lp) = next
-
-  end do
-!
-!  Add the boundary nodes between N1 and N2 as neighbors of node K.
-!
-  lsav = lnew
-  list(lnew) = n1
-  lptr(lnew) = lnew + 1
-  lnew = lnew + 1
-  next = nsav
-
-  do
-
-    if ( next == n2 ) then
-      exit
-    end if
-
-    list(lnew) = next
-    lptr(lnew) = lnew + 1
-    lnew = lnew + 1
-    lp = lend(next)
-    next = list(lp)
-
-  end do
-
-  list(lnew) = -n2
-  lptr(lnew) = lsav
-  lend(k) = lnew
-  lnew = lnew + 1
-
-  return
-end
-subroutine bnodes ( n, list, lptr, lend, nodes, nb, na, nt )
-
-!*****************************************************************************80
-!
-!! BNODES returns the boundary nodes of a triangulation.
-!
-!  Discussion:
-!
-!    Given a triangulation of N nodes on the unit sphere created by TRMESH,
-!    this subroutine returns an array containing the indexes (if any) of
-!    the counterclockwise sequence of boundary nodes, that is, the nodes on
-!    the boundary of the convex hull of the set of nodes.  The
-!    boundary is empty if the nodes do not lie in a single
-!    hemisphere.  The numbers of boundary nodes, arcs, and
-!    triangles are also returned.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the
-!    data structure defining the triangulation, created by TRMESH.
-!
-!    Output, integer ( kind = 4 ) NODES(*), the ordered sequence of NB boundary
-!    node indexes in the range 1 to N.  For safety, the dimension of NODES
-!    should be N.
-!
-!    Output, integer ( kind = 4 ) NB, the number of boundary nodes.
-!
-!    Output, integer ( kind = 4 ) NA, NT, the number of arcs and triangles,
-!    respectively, in the triangulation.
-!
-!  Local parameters:
-!
-!    K =   NODES index
-!    LP =  LIST pointer
-!    N0 =  Boundary node to be added to NODES
-!    NN =  Local copy of N
-!    NST = First element of nodes (arbitrarily chosen to be
-!          the one with smallest index)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) na
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nodes(*)
-  integer ( kind = 4 ) nst
-  integer ( kind = 4 ) nt
-
-  nn = n
-!
-!  Search for a boundary node.
-!
-  nst = 0
-
-  do i = 1, nn
-
-    lp = lend(i)
-
-    if ( list(lp) < 0 ) then
-      nst = i
-      exit
-    end if
-
-  end do
-!
-!  The triangulation contains no boundary nodes.
-!
-  if ( nst == 0 ) then
-    nb = 0
-    na = 3 * ( nn - 2 )
-    nt = 2 * ( nn - 2 )
-    return
-  end if
-!
-!  NST is the first boundary node encountered.
-!
-!  Initialize for traversal of the boundary.
-!
-  nodes(1) = nst
-  k = 1
-  n0 = nst
-!
-!  Traverse the boundary in counterclockwise order.
-!
-  do
-
-    lp = lend(n0)
-    lp = lptr(lp)
-    n0 = list(lp)
-
-    if ( n0 == nst ) then
-      exit
-    end if
-
-    k = k + 1
-    nodes(k) = n0
-
-  end do
-!
-!  Store the counts.
-!
-  nb = k
-  nt = 2 * n - nb - 2
-  na = nt + n - 1
-
-  return
-end
-subroutine circum ( v1, v2, v3, c, ier )
-
-!*****************************************************************************80
-!
-!! CIRCUM returns the circumcenter of a spherical triangle.
-!
-!  Discussion:
-!
-!    This subroutine returns the circumcenter of a spherical triangle on the
-!    unit sphere:  the point on the sphere surface that is equally distant
-!    from the three triangle vertices and lies in the same hemisphere, where
-!    distance is taken to be arc-length on the sphere surface.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) V1(3), V2(3), V3(3), the coordinates of the
-!    three triangle vertices (unit vectors) in counter clockwise order.
-!
-!    Output, real ( kind = 8 ) C(3), the coordinates of the circumcenter unless
-!    0 < IER, in which case C is not defined.  C = (V2-V1) X (V3-V1)
-!    normalized to a unit vector.
-!
-!    Output, integer ( kind = 4 ) IER = Error indicator:
-!    0, if no errors were encountered.
-!    1, if V1, V2, and V3 lie on a common line:  (V2-V1) X (V3-V1) = 0.
-!
-!  Local parameters:
-!
-!    CNORM = Norm of CU:  used to compute C
-!    CU =    Scalar multiple of C:  E1 X E2
-!    E1,E2 = Edges of the underlying planar triangle:
-!            V2-V1 and V3-V1, respectively
-!    I =     DO-loop index
-!
-  implicit none
-
-  real    ( kind = 8 ) c(3)
-  real    ( kind = 8 ) cnorm
-  real    ( kind = 8 ) cu(3)
-  real    ( kind = 8 ) e1(3)
-  real    ( kind = 8 ) e2(3)
-  integer ( kind = 4 ) ier
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) v3(3)
-
-  ier = 0
-
-  e1(1:3) = v2(1:3) - v1(1:3)
-  e2(1:3) = v3(1:3) - v1(1:3)
-!
-!  Compute CU = E1 X E2 and CNORM**2.
-!
-  cu(1) = e1(2) * e2(3) - e1(3) * e2(2)
-  cu(2) = e1(3) * e2(1) - e1(1) * e2(3)
-  cu(3) = e1(1) * e2(2) - e1(2) * e2(1)
-
-  cnorm = sqrt ( sum ( cu(1:3)**2 ) )
-!
-!  The vertices lie on a common line if and only if CU is the zero vector.
-!
-  if ( cnorm == 0.0D+00 ) then
-    ier = 1
-    return
-  end if
-
-  c(1:3) = cu(1:3) / cnorm
-
-  return
-end
-subroutine covsph ( kk, n0, list, lptr, lend, lnew )
-
-!*****************************************************************************80
-!
-!! COVSPH connects an exterior node to boundary nodes, covering the sphere.
-!
-!  Discussion:
-!
-!    This subroutine connects an exterior node KK to all
-!    boundary nodes of a triangulation of KK-1 points on the
-!    unit sphere, producing a triangulation that covers the
-!    sphere.  The data structure is updated with the addition
-!    of node KK, but no optimization is performed.  All
-!    boundary nodes must be visible from node KK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) KK = Index of the node to be connected to the
-!    set of all boundary nodes.  4 <= KK.
-!
-!    Input, integer ( kind = 4 ) N0 = Index of a boundary node (in the range
-!    1 to KK-1).  N0 may be determined by TRFIND.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the triangulation data structure created by TRMESH.  Node N0 must
-!    be included in the triangulation.  On output, updated with the addition
-!    of node KK as the last entry.  The updated triangulation contains no
-!    boundary nodes.
-!
-!  Local parameters:
-!
-!    K =     Local copy of KK
-!    LP =    LIST pointer
-!    LSAV =  LIST pointer
-!    NEXT =  Boundary node visible from K
-!    NST =   Local copy of N0
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lsav
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nst
-
-  k = kk
-  nst = n0
-!
-!  Traverse the boundary in clockwise order, inserting K as
-!  the first neighbor of each boundary node, and converting
-!  the boundary node to an interior node.
-!
-  next = nst
-
-  do
-
-    lp = lend(next)
-    call insert ( k, lp, list, lptr, lnew )
-    next = -list(lp)
-    list(lp) = next
-
-    if ( next == nst ) then
-      exit
-    end if
-
-  end do
-!
-!  Traverse the boundary again, adding each node to K's adjacency list.
-!
-  lsav = lnew
-
-  do
-
-    lp = lend(next)
-    list(lnew) = next
-    lptr(lnew) = lnew + 1
-    lnew = lnew + 1
-    next = list(lp)
-
-    if ( next == nst ) then
-      exit
-    end if
-
-  end do
-
-  lptr(lnew-1) = lsav
-  lend(k) = lnew - 1
-
-  return
-end
-subroutine crlist ( n, ncol, x, y, z, list, lend, lptr, lnew, &
-  ltri, listc, nb, xc, yc, zc, rc, ier )
-
-!*****************************************************************************80
-!
-!! CRLIST returns triangle circumcenters and other information.
-!
-!  Discussion:
-!
-!    Given a Delaunay triangulation of nodes on the surface
-!    of the unit sphere, this subroutine returns the set of
-!    triangle circumcenters corresponding to Voronoi vertices,
-!    along with the circumradii and a list of triangle indexes
-!    LISTC stored in one-to-one correspondence with LIST/LPTR
-!    entries.
-!
-!    A triangle circumcenter is the point (unit vector) lying
-!    at the same angular distance from the three vertices and
-!    contained in the same hemisphere as the vertices.  (Note
-!    that the negative of a circumcenter is also equidistant
-!    from the vertices.)  If the triangulation covers the
-!    surface, the Voronoi vertices are the circumcenters of the
-!    triangles in the Delaunay triangulation.  LPTR, LEND, and
-!    LNEW are not altered in this case.
-!
-!    On the other hand, if the nodes are contained in a
-!    single hemisphere, the triangulation is implicitly extended
-!    to the entire surface by adding pseudo-arcs (of length
-!    greater than 180 degrees) between boundary nodes forming
-!    pseudo-triangles whose 'circumcenters' are included in the
-!    list.  This extension to the triangulation actually
-!    consists of a triangulation of the set of boundary nodes in
-!    which the swap test is reversed (a non-empty circumcircle
-!    test).  The negative circumcenters are stored as the
-!    pseudo-triangle 'circumcenters'.  LISTC, LPTR, LEND, and
-!    LNEW contain a data structure corresponding to the
-!    extended triangulation (Voronoi diagram), but LIST is not
-!    altered in this case.  Thus, if it is necessary to retain
-!    the original (unextended) triangulation data structure,
-!    copies of LPTR and LNEW must be saved before calling this
-!    routine.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.  Note that, if N = 3, there are only two Voronoi vertices
-!    separated by 180 degrees, and the Voronoi regions are not well defined.
-!
-!    Input, integer ( kind = 4 ) NCOL, the number of columns reserved for LTRI.
-!    This must be at least NB-2, where NB is the number of boundary nodes.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes
-!    (unit vectors).
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), the set of adjacency lists.
-!    Refer to TRMESH.
-!
-!    Input, integer ( kind = 4 ) LEND(N), the set of pointers to ends of
-!    adjacency lists.  Refer to TRMESH.
-!
-!    Input/output, integer ( kind = 4 ) LPTR(6*(N-2)), pointers associated
-!    with LIST.  Refer to TRMESH.  On output, pointers associated with LISTC.
-!    Updated for the addition of pseudo-triangles if the original triangulation
-!    contains boundary nodes (0 < NB).
-!
-!    Input/output, integer ( kind = 4 ) LNEW.  On input, a pointer to the first
-!    empty location in LIST and LPTR (list length plus one).  On output,
-!    pointer to the first empty location in LISTC and LPTR (list length plus
-!    one).  LNEW is not altered if NB = 0.
-!
-!    Output, integer ( kind = 4 ) LTRI(6,NCOL).  Triangle list whose first NB-2
-!    columns contain the indexes of a clockwise-ordered sequence of vertices
-!    (first three rows) followed by the LTRI column indexes of the triangles
-!    opposite the vertices (or 0 denoting the exterior region) in the last
-!    three rows. This array is not generally of any further use outside this
-!    routine.
-!
-!    Output, integer ( kind = 4 ) LISTC(3*NT), where NT = 2*N-4 is the number
-!    of triangles in the triangulation (after extending it to cover the entire
-!    surface if necessary).  Contains the triangle indexes (indexes to XC, YC,
-!    ZC, and RC) stored in 1-1 correspondence with LIST/LPTR entries (or entries
-!    that would be stored in LIST for the extended triangulation):  the index
-!    of triangle (N1,N2,N3) is stored in LISTC(K), LISTC(L), and LISTC(M),
-!    where LIST(K), LIST(L), and LIST(M) are the indexes of N2 as a neighbor
-!    of N1, N3 as a neighbor of N2, and N1 as a neighbor of N3.  The Voronoi
-!    region associated with a node is defined by the CCW-ordered sequence of
-!    circumcenters in one-to-one correspondence with its adjacency
-!    list (in the extended triangulation).
-!
-!    Output, integer ( kind = 4 ) NB, the number of boundary nodes unless
-!    IER = 1.
-!
-!    Output, real ( kind = 8 ) XC(2*N-4), YC(2*N-4), ZC(2*N-4), the coordinates
-!    of the triangle circumcenters (Voronoi vertices).  XC(I)**2 + YC(I)**2
-!    + ZC(I)**2 = 1.  The first NB-2 entries correspond to pseudo-triangles
-!    if 0 < NB.
-!
-!    Output, real ( kind = 8 ) RC(2*N-4), the circumradii (the arc lengths or
-!    angles between the circumcenters and associated triangle vertices) in
-!    1-1 correspondence with circumcenters.
-!
-!    Output, integer ( kind = 4 ) IER = Error indicator:
-!    0, if no errors were encountered.
-!    1, if N < 3.
-!    2, if NCOL < NB-2.
-!    3, if a triangle is degenerate (has vertices lying on a common geodesic).
-!
-!  Local parameters:
-!
-!    C =         Circumcenter returned by Subroutine CIRCUM
-!    I1,I2,I3 =  Permutation of (1,2,3):  LTRI row indexes
-!    I4 =        LTRI row index in the range 1 to 3
-!    IERR =      Error flag for calls to CIRCUM
-!    KT =        Triangle index
-!    KT1,KT2 =   Indexes of a pair of adjacent pseudo-triangles
-!    KT11,KT12 = Indexes of the pseudo-triangles opposite N1
-!                and N2 as vertices of KT1
-!    KT21,KT22 = Indexes of the pseudo-triangles opposite N1
-!                and N2 as vertices of KT2
-!    LP,LPN =    LIST pointers
-!    LPL =       LIST pointer of the last neighbor of N1
-!    N0 =        Index of the first boundary node (initial
-!                value of N1) in the loop on boundary nodes
-!                used to store the pseudo-triangle indexes
-!                in LISTC
-!    N1,N2,N3 =  Nodal indexes defining a triangle (CCW order)
-!                or pseudo-triangle (clockwise order)
-!    N4 =        Index of the node opposite N2 -> N1
-!    NM2 =       N-2
-!    NN =        Local copy of N
-!    NT =        Number of pseudo-triangles:  NB-2
-!    SWP =       Logical variable set to TRUE in each optimization
-!                loop (loop on pseudo-arcs) iff a swap is performed.
-!
-!    V1,V2,V3 =  Vertices of triangle KT = (N1,N2,N3) sent to subroutine
-!                CIRCUM
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) ncol
-
-  real    ( kind = 8 ) c(3)
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) i4
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) kt
-  integer ( kind = 4 ) kt1
-  integer ( kind = 4 ) kt11
-  integer ( kind = 4 ) kt12
-  integer ( kind = 4 ) kt2
-  integer ( kind = 4 ) kt21
-  integer ( kind = 4 ) kt22
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) listc(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpn
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) ltri(6,ncol)
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) n4
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nm2
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nt
-  real    ( kind = 8 ) rc(2*n-4)
-  logical swp
-  logical swptst
-  real    ( kind = 8 ) t
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) v3(3)
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) xc(2*n-4)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) yc(2*n-4)
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) zc(2*n-4)
-
-  nn = n
-  nb = 0
-  nt = 0
-
-  if ( nn < 3 ) then
-    ier = 1
-    return
-  end if
-!
-!  Search for a boundary node N1.
-!
-  lp = 0
-
-  do n1 = 1, nn
-
-    if ( list(lend(n1)) < 0 ) then
-      lp = lend(n1)
-      exit
-    end if
-
-  end do
-!
-!  The triangulation already covers the sphere.
-!
-  if ( lp == 0 ) then
-    go to 9
-  end if
-!
-!  There are 3 <= NB boundary nodes.  Add NB-2 pseudo-triangles (N1,N2,N3)
-!  by connecting N3 to the NB-3 boundary nodes to which it is not
-!  already adjacent.
-!
-!  Set N3 and N2 to the first and last neighbors,
-!  respectively, of N1.
-!
-  n2 = -list(lp)
-  lp = lptr(lp)
-  n3 = list(lp)
-!
-!  Loop on boundary arcs N1 -> N2 in clockwise order,
-!  storing triangles (N1,N2,N3) in column NT of LTRI
-!  along with the indexes of the triangles opposite
-!  the vertices.
-!
-  do
-
-    nt = nt + 1
-
-    if ( nt <= ncol ) then
-      ltri(1,nt) = n1
-      ltri(2,nt) = n2
-      ltri(3,nt) = n3
-      ltri(4,nt) = nt + 1
-      ltri(5,nt) = nt - 1
-      ltri(6,nt) = 0
-    end if
-
-    n1 = n2
-    lp = lend(n1)
-    n2 = -list(lp)
-
-    if ( n2 == n3 ) then
-      exit
-    end if
-
-  end do
-
-  nb = nt + 2
-
-  if ( ncol < nt ) then
-    ier = 2
-    return
-  end if
-
-  ltri(4,nt) = 0
-!
-!  Optimize the exterior triangulation (set of pseudo-
-!  triangles) by applying swaps to the pseudo-arcs N1-N2
-!  (pairs of adjacent pseudo-triangles KT1 and KT1 < KT2).
-!  The loop on pseudo-arcs is repeated until no swaps are
-!  performed.
-!
-  if ( nt /= 1 ) then
-
-    do
-
-      swp = .false.
-
-      do kt1 = 1, nt-1
-
-        do i3 = 1, 3
-
-          kt2 = ltri(i3+3,kt1)
-
-          if ( kt2 <= kt1 ) then
-            cycle
-          end if
-!
-!  The LTRI row indexes (I1,I2,I3) of triangle KT1 =
-!  (N1,N2,N3) are a cyclical permutation of (1,2,3).
-!
-          if ( i3 == 1 ) then
-            i1 = 2
-            i2 = 3
-          else if ( i3 == 2 ) then
-            i1 = 3
-            i2 = 1
-          else
-            i1 = 1
-            i2 = 2
-          end if
-
-          n1 = ltri(i1,kt1)
-          n2 = ltri(i2,kt1)
-          n3 = ltri(i3,kt1)
-!
-!  KT2 = (N2,N1,N4) for N4 = LTRI(I,KT2), where LTRI(I+3,KT2) = KT1.
-!
-          if ( ltri(4,kt2) == kt1 ) then
-            i4 = 1
-          else if ( ltri(5,kt2 ) == kt1 ) then
-            i4 = 2
-          else
-            i4 = 3
-          end if
-
-          n4 = ltri(i4,kt2)
-!
-!  The empty circumcircle test is reversed for the pseudo-
-!  triangles.  The reversal is implicit in the clockwise
-!  ordering of the vertices.
-!
-          if ( .not. swptst ( n1, n2, n3, n4, x, y, z ) ) then
-            cycle
-          end if
-!
-!  Swap arc N1-N2 for N3-N4.  KTij is the triangle opposite
-!  Nj as a vertex of KTi.
-!
-          swp = .true.
-          kt11 = ltri(i1+3,kt1)
-          kt12 = ltri(i2+3,kt1)
-
-          if ( i4 == 1 ) then
-            i2 = 2
-            i1 = 3
-          else if ( i4 == 2 ) then
-            i2 = 3
-            i1 = 1
-          else
-            i2 = 1
-            i1 = 2
-          end if
-
-          kt21 = ltri(i1+3,kt2)
-          kt22 = ltri(i2+3,kt2)
-          ltri(1,kt1) = n4
-          ltri(2,kt1) = n3
-          ltri(3,kt1) = n1
-          ltri(4,kt1) = kt12
-          ltri(5,kt1) = kt22
-          ltri(6,kt1) = kt2
-          ltri(1,kt2) = n3
-          ltri(2,kt2) = n4
-          ltri(3,kt2) = n2
-          ltri(4,kt2) = kt21
-          ltri(5,kt2) = kt11
-          ltri(6,kt2) = kt1
-!
-!  Correct the KT11 and KT22 entries that changed.
-!
-          if ( kt11 /= 0 ) then
-            i4 = 4
-            if ( ltri(4,kt11) /= kt1 ) then
-              i4 = 5
-              if ( ltri(5,kt11) /= kt1 ) i4 = 6
-            end if
-            ltri(i4,kt11) = kt2
-          end if
-
-          if ( kt22 /= 0 ) then
-            i4 = 4
-            if ( ltri(4,kt22) /= kt2 ) then
-              i4 = 5
-              if ( ltri(5,kt22) /= kt2 ) then
-                i4 = 6
-              end if
-            end if
-            ltri(i4,kt22) = kt1
-          end if
-
-        end do
-
-      end do
-
-      if ( .not. swp ) then
-        exit
-      end if
-
-    end do
-
-  end if
-!
-!  Compute and store the negative circumcenters and radii of
-!  the pseudo-triangles in the first NT positions.
-!
-  do kt = 1, nt
-
-    n1 = ltri(1,kt)
-    n2 = ltri(2,kt)
-    n3 = ltri(3,kt)
-    v1(1) = x(n1)
-    v1(2) = y(n1)
-    v1(3) = z(n1)
-    v2(1) = x(n2)
-    v2(2) = y(n2)
-    v2(3) = z(n2)
-    v3(1) = x(n3)
-    v3(2) = y(n3)
-    v3(3) = z(n3)
-
-    call circum ( v1, v2, v3, c, ierr )
-
-    if ( ierr /= 0 ) then
-      ier = 3
-      return
-    end if
-!
-!  Store the negative circumcenter and radius (computed from <V1,C>).
-!
-    xc(kt) = c(1)
-    yc(kt) = c(2)
-    zc(kt) = c(3)
-
-    t = dot_product ( v1(1:3), c(1:3) )
-    t = max ( t, -1.0D+00 )
-    t = min ( t, +1.0D+00 )
-
-    rc(kt) = acos(t)
-
-  end do
-!
-!  Compute and store the circumcenters and radii of the
-!  actual triangles in positions KT = NT+1, NT+2, ...
-!
-!  Also, store the triangle indexes KT in the appropriate LISTC positions.
-!
-9 continue
-
-  kt = nt
-!
-!  Loop on nodes N1.
-!
-  nm2 = nn - 2
-
-  do n1 = 1, nm2
-
-    lpl = lend(n1)
-    lp = lpl
-    n3 = list(lp)
-!
-!  Loop on adjacent neighbors N2,N3 of N1 for which N1 < N2 and N1 < N3.
-!
-    do
-
-      lp = lptr(lp)
-      n2 = n3
-      n3 = abs ( list(lp) )
-
-      if ( n1 < n2 .and. n1 < n3 ) then
-
-        kt = kt + 1
-!
-!  Compute the circumcenter C of triangle KT = (N1,N2,N3).
-!
-        v1(1) = x(n1)
-        v1(2) = y(n1)
-        v1(3) = z(n1)
-        v2(1) = x(n2)
-        v2(2) = y(n2)
-        v2(3) = z(n2)
-        v3(1) = x(n3)
-        v3(2) = y(n3)
-        v3(3) = z(n3)
-
-        call circum ( v1, v2, v3, c, ierr )
-
-        if ( ierr /= 0 ) then
-          ier = 3
-          return
-        end if
-!
-!  Store the circumcenter, radius and triangle index.
-!
-        xc(kt) = c(1)
-        yc(kt) = c(2)
-        zc(kt) = c(3)
-
-        t = dot_product ( v1(1:3), c(1:3) )
-        t = max ( t, -1.0D+00 )
-        t = min ( t, +1.0D+00 )
-
-        rc(kt) = acos(t)
-!
-!  Store KT in LISTC(LPN), where abs ( LIST(LPN) ) is the
-!  index of N2 as a neighbor of N1, N3 as a neighbor
-!  of N2, and N1 as a neighbor of N3.
-!
-        lpn = lstptr ( lpl, n2, list, lptr )
-        listc(lpn) = kt
-        lpn = lstptr ( lend(n2), n3, list, lptr )
-        listc(lpn) = kt
-        lpn = lstptr ( lend(n3), n1, list, lptr )
-        listc(lpn) = kt
-
-      end if
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-
-  if ( nt == 0 ) then
-    ier = 0
-    return
-  end if
-!
-!  Store the first NT triangle indexes in LISTC.
-!
-!  Find a boundary triangle KT1 = (N1,N2,N3) with a boundary arc opposite N3.
-!
-  kt1 = 0
-
-  do
-
-    kt1 = kt1 + 1
-
-    if ( ltri(4,kt1) == 0 ) then
-      i1 = 2
-      i2 = 3
-      i3 = 1
-      exit
-    else if ( ltri(5,kt1) == 0 ) then
-      i1 = 3
-      i2 = 1
-      i3 = 2
-      exit
-    else if ( ltri(6,kt1) == 0 ) then
-      i1 = 1
-      i2 = 2
-      i3 = 3
-      exit
-    end if
-
-  end do
-
-  n1 = ltri(i1,kt1)
-  n0 = n1
-!
-!  Loop on boundary nodes N1 in CCW order, storing the
-!  indexes of the clockwise-ordered sequence of triangles
-!  that contain N1.  The first triangle overwrites the
-!  last neighbor position, and the remaining triangles,
-!  if any, are appended to N1's adjacency list.
-!
-!  A pointer to the first neighbor of N1 is saved in LPN.
-!
-  do
-
-    lp = lend(n1)
-    lpn = lptr(lp)
-    listc(lp) = kt1
-!
-!  Loop on triangles KT2 containing N1.
-!
-    do
-
-      kt2 = ltri(i2+3,kt1)
-
-      if ( kt2 == 0 ) then
-        exit
-      end if
-!
-!  Append KT2 to N1's triangle list.
-!
-      lptr(lp) = lnew
-      lp = lnew
-      listc(lp) = kt2
-      lnew = lnew + 1
-!
-!  Set KT1 to KT2 and update (I1,I2,I3) such that LTRI(I1,KT1) = N1.
-!
-      kt1 = kt2
-
-      if ( ltri(1,kt1) == n1 ) then
-        i1 = 1
-        i2 = 2
-        i3 = 3
-      else if ( ltri(2,kt1) == n1 ) then
-        i1 = 2
-        i2 = 3
-        i3 = 1
-      else
-        i1 = 3
-        i2 = 1
-        i3 = 2
-      end if
-
-    end do
-!
-!  Store the saved first-triangle pointer in LPTR(LP), set
-!  N1 to the next boundary node, test for termination,
-!  and permute the indexes:  the last triangle containing
-!  a boundary node is the first triangle containing the
-!  next boundary node.
-!
-    lptr(lp) = lpn
-    n1 = ltri(i3,kt1)
-
-    if ( n1 == n0 ) then
-      exit
-    end if
-
-    i4 = i3
-    i3 = i2
-    i2 = i1
-    i1 = i4
-
-  end do
-
-  ier = 0
-
-  return
-end
-subroutine delarc ( n, io1, io2, list, lptr, lend, lnew, ier )
-
-!*****************************************************************************80
-!
-!! DELARC deletes a boundary arc from a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine deletes a boundary arc from a triangulation
-!    It may be used to remove a null triangle from the
-!    convex hull boundary.  Note, however, that if the union of
-!    triangles is rendered nonconvex, subroutines DELNOD, EDGE,
-!    and TRFIND (and hence ADDNOD) may fail.  Also, function
-!    NEARND should not be called following an arc deletion.
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    4 <= N.
-!
-!    Input, integer ( kind = 4 ) IO1, IO2, indexes (in the range 1 to N) of
-!    a pair of adjacent boundary nodes defining the arc to be removed.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the triangulation data structure created by TRMESH.  On output,
-!    updated with the removal of arc IO1-IO2 unless 0 < IER.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if N, IO1, or IO2 is outside its valid range, or IO1 = IO2.
-!    2, if IO1-IO2 is not a boundary arc.
-!    3, if the node opposite IO1-IO2 is already a boundary node, and thus IO1
-!      or IO2 has only two neighbors or a deletion would result in two
-!      triangulations sharing a single node.
-!    4, if one of the nodes is a neighbor of the other, but not vice versa,
-!      implying an invalid triangulation data structure.
-!
-!  Local parameters:
-!
-!    LP =       LIST pointer
-!    LPH =      LIST pointer or flag returned by DELNB
-!    LPL =      Pointer to the last neighbor of N1, N2, or N3
-!    N1,N2,N3 = Nodal indexes of a triangle such that N1->N2
-!               is the directed boundary edge associated with IO1-IO2
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-
-  n1 = io1
-  n2 = io2
-!
-!  Test for errors.
-!
-  if ( n < 4 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n1 < 1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n < n1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n2 < 1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n < n2 ) then
-    ier = 1
-    return
-  end if
-
-  if ( n1 == n2 ) then
-    ier = 1
-    return
-  end if
-!
-!  Set N1->N2 to the directed boundary edge associated with IO1-IO2:
-!  (N1,N2,N3) is a triangle for some N3.
-!
-  lpl = lend(n2)
-
-  if ( -list(lpl) /= n1 ) then
-    n1 = n2
-    n2 = io1
-    lpl = lend(n2)
-    if ( -list(lpl) /= n1 ) then
-      ier = 2
-      return
-    end if
-  end if
-!
-!  Set N3 to the node opposite N1->N2 (the second neighbor
-!  of N1), and test for error 3 (N3 already a boundary node).
-!
-  lpl = lend(n1)
-  lp = lptr(lpl)
-  lp = lptr(lp)
-  n3 = abs ( list(lp) )
-  lpl = lend(n3)
-
-  if ( list(lpl) <= 0 ) then
-    ier = 3
-    return
-  end if
-!
-!  Delete N2 as a neighbor of N1, making N3 the first
-!  neighbor, and test for error 4 (N2 not a neighbor
-!  of N1).  Note that previously computed pointers may
-!  no longer be valid following the call to DELNB.
-!
-  call delnb ( n1, n2, n, list, lptr, lend, lnew, lph )
-
-  if ( lph < 0 ) then
-    ier = 4
-    return
-  end if
-!
-!  Delete N1 as a neighbor of N2, making N3 the new last neighbor.
-!
-  call delnb ( n2, n1, n, list, lptr, lend, lnew, lph )
-!
-!  Make N3 a boundary node with first neighbor N2 and last neighbor N1.
-!
-  lp = lstptr ( lend(n3), n1, list, lptr )
-  lend(n3) = lp
-  list(lp) = -n1
-!
-!  No errors encountered.
-!
-  ier = 0
-
-  return
-end
-subroutine delnb ( n0, nb, n, list, lptr, lend, lnew, lph )
-
-!*****************************************************************************80
-!
-!! DELNB deletes a neighbor from the adjacency list.
-!
-!  Discussion:
-!
-!    This subroutine deletes a neighbor NB from the adjacency
-!    list of node N0 (but N0 is not deleted from the adjacency
-!    list of NB) and, if NB is a boundary node, makes N0 a
-!    boundary node.
-!
-!    For pointer (LIST index) LPH to NB as a neighbor of N0, the empty
-!    LIST, LPTR location LPH is filled in with the values at LNEW-1,
-!    pointer LNEW-1 (in LPTR and possibly in LEND) is changed to LPH,
-!    and LNEW is decremented.
-!
-!    This requires a search of LEND and LPTR entailing an
-!    expected operation count of O(N).
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka,
-!    Department of Computer Science,
-!    University of North Texas,
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N0, NB, indexes, in the range 1 to N, of a
-!    pair of nodes such that NB is a neighbor of N0.  (N0 need not be a
-!    neighbor of NB.)
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), LNEW,
-!    the data structure defining the triangulation.  On output, updated with
-!    the removal of NB from the adjacency list of N0 unless LPH < 0.
-!
-!    Input, integer ( kind = 4 ) LPH, list pointer to the hole (NB as a
-!    neighbor of N0) filled in by the values at LNEW-1 or error indicator:
-!    >  0, if no errors were encountered.
-!    = -1, if N0, NB, or N is outside its valid range.
-!    = -2, if NB is not a neighbor of N0.
-!
-!  Local parameters:
-!
-!    I =   DO-loop index
-!    LNW = LNEW-1 (output value of LNEW)
-!    LP =  LIST pointer of the last neighbor of NB
-!    LPB = Pointer to NB as a neighbor of N0
-!    LPL = Pointer to the last neighbor of N0
-!    LPP = Pointer to the neighbor of N0 that precedes NB
-!    NN =  Local copy of N
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lnw
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpb
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpp
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nn
-
-  nn = n
-!
-!  Test for error 1.
-!
-  if ( n0 < 1 ) then
-    lph = -1
-    return
-  end if
-
-  if ( nn < n0 .or. nb < 1  .or. &
-      nn < nb .or. nn < 3 ) then
-    lph = -1
-    return
-  end if
-!
-!  Find pointers to neighbors of N0:
-!
-!  LPL points to the last neighbor,
-!  LPP points to the neighbor NP preceding NB, and
-!  LPB points to NB.
-!
-  lpl = lend(n0)
-  lpp = lpl
-  lpb = lptr(lpp)
-
-  do
-
-    if ( list(lpb) == nb ) then
-      go to 2
-    end if
-
-    lpp = lpb
-    lpb = lptr(lpp)
-
-    if ( lpb == lpl ) then
-      exit
-    end if
-
-  end do
-!
-!  Test for error 2 (NB not found).
-!
-  if ( abs ( list(lpb) ) /= nb ) then
-    lph = -2
-    return
-  end if
-!
-!  NB is the last neighbor of N0.  Make NP the new last
-!  neighbor and, if NB is a boundary node, then make N0
-!  a boundary node.
-!
-  lend(n0) = lpp
-  lp = lend(nb)
-
-  if ( list(lp) < 0 ) then
-    list(lpp) = -list(lpp)
-  end if
-
-  go to 3
-!
-!  NB is not the last neighbor of N0.  If NB is a boundary
-!  node and N0 is not, then make N0 a boundary node with
-!  last neighbor NP.
-!
-2 continue
-
-  lp = lend(nb)
-
-  if ( list(lp) < 0 .and. 0 < list(lpl) ) then
-    lend(n0) = lpp
-    list(lpp) = -list(lpp)
-  end if
-!
-!  Update LPTR so that the neighbor following NB now follows
-!  NP, and fill in the hole at location LPB.
-!
-3 continue
-
-  lptr(lpp) = lptr(lpb)
-  lnw = lnew-1
-  list(lpb) = list(lnw)
-  lptr(lpb) = lptr(lnw)
-
-  do i = nn, 1, -1
-    if ( lend(i) == lnw ) then
-      lend(i) = lpb
-      exit
-    end if
-  end do
-
-  do i = 1, lnw-1
-    if ( lptr(i) == lnw ) then
-      lptr(i) = lpb
-    end if
-  end do
-!
-!  No errors encountered.
-!
-  lnew = lnw
-  lph = lpb
-
-  return
-end
-subroutine delnod ( k, n, x, y, z, list, lptr, lend, lnew, lwk, iwk, ier )
-
-!*****************************************************************************80
-!
-!! DELNOD deletes a node from a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine deletes node K (along with all arcs incident on node K)
-!    from a triangulation of N nodes on the unit sphere, and inserts arcs as
-!    necessary to produce a triangulation of the remaining N-1 nodes.  If a
-!    Delaunay triangulation is input, a Delaunay triangulation will result,
-!    and thus, DELNOD reverses the effect of a call to ADDNOD.
-!
-!    Note that the deletion may result in all remaining nodes
-!    being collinear.  This situation is not flagged.
-!
-!  Modified:
-!
-!    17 June 2002
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) K, index (for X, Y, and Z) of the node to be
-!    deleted.  1 <= K <= N.
-!
-!    Input/output, integer ( kind = 4 ) N, the number of nodes in the
-!    triangulation.  4 <= N.  Note that N will be decremented following the
-!    deletion.
-!
-!    Input/output, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of
-!    the nodes in the triangulation.  On output, updated with elements
-!    K+1,...,N+1 shifted up one position, thus overwriting element K,
-!    unless 1 <= IER <= 4.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    LNEW, the data structure defining the triangulation, created by TRMESH.
-!    On output, updated to reflect the deletion unless 1 <= IER <= 4.
-!    Note that the data structure may have been altered if 3 < IER.
-!
-!    Input/output, integer ( kind = 4 ) LWK, the number of columns reserved for
-!    IWK.  LWK must be at least NNB-3, where NNB is the number of neighbors of
-!    node K, including an extra pseudo-node if K is a boundary node.
-!    On output, the number of IWK columns required unless IER = 1 or IER = 3.
-!
-!    Output, integer ( kind = 4 ) IWK(2,LWK), indexes of the endpoints of the
-!    new arcs added unless LWK = 0 or 1 <= IER <= 4.  (Arcs are associated with
-!    columns.)
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if K or N is outside its valid range or LWK < 0 on input.
-!    2, if more space is required in IWK.  Refer to LWK.
-!    3, if the triangulation data structure is invalid on input.
-!    4, if K indexes an interior node with four or more neighbors, none of
-!      which can be swapped out due to collinearity, and K cannot therefore
-!      be deleted.
-!    5, if an error flag (other than IER = 1) was returned by OPTIM.  An error
-!      message is written to the standard output unit in this case.
-!    6, if error flag 1 was returned by OPTIM.  This is not necessarily an
-!      error, but the arcs may not be optimal.
-!
-!  Local parameters:
-!
-!    BDRY =    Logical variable with value TRUE iff N1 is a boundary node
-!    I,J =     DO-loop indexes
-!    IERR =    Error flag returned by OPTIM
-!    IWL =     Number of IWK columns containing arcs
-!    LNW =     Local copy of LNEW
-!    LP =      LIST pointer
-!    LP21 =    LIST pointer returned by SWAP
-!    LPF,LPL = Pointers to the first and last neighbors of N1
-!    LPH =     Pointer (or flag) returned by DELNB
-!    LPL2 =    Pointer to the last neighbor of N2
-!    LPN =     Pointer to a neighbor of N1
-!    LWKL =    Input value of LWK
-!    N1 =      Local copy of K
-!    N2 =      Neighbor of N1
-!    NFRST =   First neighbor of N1:  LIST(LPF)
-!    NIT =     Number of iterations in OPTIM
-!    NR,NL =   Neighbors of N1 preceding (to the right of) and
-!              following (to the left of) N2, respectively
-!    NN =      Number of nodes in the triangulation
-!    NNB =     Number of neighbors of N1 (including a pseudo-
-!              node representing the boundary if N1 is a
-!              boundary node)
-!    X1,Y1,Z1 = Coordinates of N1
-!    X2,Y2,Z2 = Coordinates of N2
-!    XL,YL,ZL = Coordinates of NL
-!    XR,YR,ZR = Coordinates of NR
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  logical bdry
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) iwk(2,*)
-  integer ( kind = 4 ) iwl
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) k
-  logical left
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lnw
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lpf
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpl2
-  integer ( kind = 4 ) lpn
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) lwk
-  integer ( kind = 4 ) lwkl
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) nbcnt
-  integer ( kind = 4 ) nfrst
-  integer ( kind = 4 ) nit
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nnb
-  integer ( kind = 4 ) nr
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) xl
-  real    ( kind = 8 ) xr
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) yl
-  real    ( kind = 8 ) yr
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-  real    ( kind = 8 ) zl
-  real    ( kind = 8 ) zr
-!
-!  Set N1 to K and NNB to the number of neighbors of N1 (plus
-!  one if N1 is a boundary node), and test for errors.  LPF
-!  and LPL are LIST indexes of the first and last neighbors
-!  of N1, IWL is the number of IWK columns containing arcs,
-!  and BDRY is TRUE iff N1 is a boundary node.
-!
-  n1 = k
-  nn = n
-
-  if ( n1 < 1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( nn < n1 ) then
-    ier = 1
-    return
-  end if
-
-  if ( nn < 4 ) then
-    ier = 1
-    return
-  end if
-
-  if ( lwk < 0 ) then
-    ier = 1
-    return
-  end if
-
-  lpl = lend(n1)
-  lpf = lptr(lpl)
-  nnb = nbcnt(lpl,lptr)
-  bdry = list(lpl) < 0
-
-  if ( bdry ) then
-    nnb = nnb + 1
-  end if
-
-  if ( nnb < 3 ) then
-    ier = 3
-    return
-  end if
-
-  lwkl = lwk
-  lwk = nnb - 3
-
-  if ( lwkl < lwk ) then
-    ier = 2
-    return
-  end if
-
-  iwl = 0
-
-  if ( nnb == 3 ) then
-    go to 3
-  end if
-!
-!  Initialize for loop on arcs N1-N2 for neighbors N2 of N1,
-!  beginning with the second neighbor.  NR and NL are the
-!  neighbors preceding and following N2, respectively, and
-!  LP indexes NL.  The loop is exited when all possible
-!  swaps have been applied to arcs incident on N1.
-!
-  x1 = x(n1)
-  y1 = y(n1)
-  z1 = z(n1)
-  nfrst = list(lpf)
-  nr = nfrst
-  xr = x(nr)
-  yr = y(nr)
-  zr = z(nr)
-  lp = lptr(lpf)
-  n2 = list(lp)
-  x2 = x(n2)
-  y2 = y(n2)
-  z2 = z(n2)
-  lp = lptr(lp)
-!
-!  Top of loop:  set NL to the neighbor following N2.
-!
-  do
-
-    nl = abs ( list(lp) )
-
-    if ( nl == nfrst .and. bdry ) then
-      exit
-    end if
-
-    xl = x(nl)
-    yl = y(nl)
-    zl = z(nl)
-!
-!  Test for a convex quadrilateral.  To avoid an incorrect
-!  test caused by collinearity, use the fact that if N1
-!  is a boundary node, then N1 LEFT NR->NL and if N2 is
-!  a boundary node, then N2 LEFT NL->NR.
-!
-    lpl2 = lend(n2)
-!
-!  Nonconvex quadrilateral -- no swap is possible.
-!
-    if ( .not. ((bdry .or. left(xr,yr,zr,xl,yl,zl,x1,y1, &
-        z1)) .and. (list(lpl2) < 0  .or. &
-        left(xl,yl,zl,xr,yr,zr,x2,y2,z2))) ) then
-      nr = n2
-      xr = x2
-      yr = y2
-      zr = z2
-      go to 2
-    end if
-!
-!  The quadrilateral defined by adjacent triangles
-!  (N1,N2,NL) and (N2,N1,NR) is convex.  Swap in
-!  NL-NR and store it in IWK unless NL and NR are
-!  already adjacent, in which case the swap is not
-!  possible.  Indexes larger than N1 must be decremented
-!  since N1 will be deleted from X, Y, and Z.
-!
-    call swap ( nl, nr, n1, n2, list, lptr, lend, lp21 )
-
-    if ( lp21 == 0 ) then
-      nr = n2
-      xr = x2
-      yr = y2
-      zr = z2
-      go to 2
-    end if
-
-    iwl = iwl + 1
-
-    if ( nl <= n1 ) then
-      iwk(1,iwl) = nl
-    else
-      iwk(1,iwl) = nl - 1
-    end if
-
-    if ( nr <= n1 ) then
-      iwk(2,iwl) = nr
-    else
-      iwk(2,iwl) = nr - 1
-    end if
-!
-!  Recompute the LIST indexes and NFRST, and decrement NNB.
-!
-    lpl = lend(n1)
-    nnb = nnb - 1
-
-    if ( nnb == 3 ) then
-      exit
-    end if
-
-    lpf = lptr(lpl)
-    nfrst = list(lpf)
-    lp = lstptr ( lpl, nl, list, lptr )
-!
-!  NR is not the first neighbor of N1.
-!  Back up and test N1-NR for a swap again:  Set N2 to
-!  NR and NR to the previous neighbor of N1 -- the
-!  neighbor of NR which follows N1.  LP21 points to NL
-!  as a neighbor of NR.
-!
-    if ( nr /= nfrst ) then
-
-      n2 = nr
-      x2 = xr
-      y2 = yr
-      z2 = zr
-      lp21 = lptr(lp21)
-      lp21 = lptr(lp21)
-      nr = abs ( list(lp21) )
-      xr = x(nr)
-      yr = y(nr)
-      zr = z(nr)
-      cycle
-
-    end if
-!
-!  Bottom of loop -- test for termination of loop.
-!
-2   continue
-
-    if ( n2 == nfrst ) then
-      exit
-    end if
-
-    n2 = nl
-    x2 = xl
-    y2 = yl
-    z2 = zl
-    lp = lptr(lp)
-
-  end do
-!
-!  Delete N1 and all its incident arcs.  If N1 is an interior
-!  node and either 3 < NNB or NNB = 3 and N2 LEFT NR->NL,
-!  then N1 must be separated from its neighbors by a plane
-!  containing the origin -- its removal reverses the effect
-!  of a call to COVSPH, and all its neighbors become
-!  boundary nodes.  This is achieved by treating it as if
-!  it were a boundary node (setting BDRY to TRUE, changing
-!  a sign in LIST, and incrementing NNB).
-!
-3   continue
-
-  if ( .not. bdry ) then
-
-    if ( 3 < nnb ) then
-      bdry = .true.
-    else
-      lpf = lptr(lpl)
-      nr = list(lpf)
-      lp = lptr(lpf)
-      n2 = list(lp)
-      nl = list(lpl)
-      bdry = left ( x(nr), y(nr), z(nr), x(nl), y(nl), z(nl), &
-        x(n2), y(n2), z(n2) )
-    end if
-!
-!  If a boundary node already exists, then N1 and its
-!  neighbors cannot be converted to boundary nodes.
-!  (They must be collinear.)  This is a problem if 3 < NNB.
-!
-    if ( bdry ) then
-
-      do i = 1, nn
-        if ( list(lend(i)) < 0 ) then
-          bdry = .false.
-          go to 5
-        end if
-      end do
-
-      list(lpl) = -list(lpl)
-      nnb = nnb + 1
-
-    end if
-
-  end if
-
-5 continue
-
-  if ( .not. bdry .and. 3 < nnb ) then
-    ier = 4
-    return
-  end if
-!
-!  Initialize for loop on neighbors.  LPL points to the last
-!  neighbor of N1.  LNEW is stored in local variable LNW.
-!
-  lp = lpl
-  lnw = lnew
-!
-!  Loop on neighbors N2 of N1, beginning with the first.
-!
-6   continue
-
-    lp = lptr(lp)
-    n2 = abs ( list(lp) )
-
-    call delnb ( n2, n1, n, list, lptr, lend, lnw, lph )
-
-    if ( lph < 0 ) then
-      ier = 3
-      return
-    end if
-!
-!  LP and LPL may require alteration.
-!
-    if ( lpl == lnw ) then
-      lpl = lph
-    end if
-
-    if ( lp == lnw ) then
-      lp = lph
-    end if
-
-    if ( lp /= lpl ) then
-      go to 6
-    end if
-!
-!  Delete N1 from X, Y, Z, and LEND, and remove its adjacency
-!  list from LIST and LPTR.  LIST entries (nodal indexes)
-!  which are larger than N1 must be decremented.
-!
-  nn = nn - 1
-
-  if ( nn < n1 ) then
-    go to 9
-  end if
-
-  do i = n1, nn
-    x(i) = x(i+1)
-    y(i) = y(i+1)
-    z(i) = z(i+1)
-    lend(i) = lend(i+1)
-  end do
-
-  do i = 1, lnw-1
-
-    if ( n1 < list(i) ) then
-      list(i) = list(i) - 1
-    end if
-
-    if ( list(i) < -n1 ) then
-      list(i) = list(i) + 1
-    end if
-
-  end do
-!
-!  For LPN = first to last neighbors of N1, delete the
-!  preceding neighbor (indexed by LP).
-!
-!  Each empty LIST,LPTR location LP is filled in with the
-!  values at LNW-1, and LNW is decremented.  All pointers
-!  (including those in LPTR and LEND) with value LNW-1
-!  must be changed to LP.
-!
-!  LPL points to the last neighbor of N1.
-!
-9 continue
-
-  if ( bdry ) then
-    nnb = nnb - 1
-  end if
-
-  lpn = lpl
-
-  do j = 1, nnb
-
-    lnw = lnw - 1
-    lp = lpn
-    lpn = lptr(lp)
-    list(lp) = list(lnw)
-    lptr(lp) = lptr(lnw)
-
-    if ( lptr(lpn) == lnw ) then
-      lptr(lpn) = lp
-    end if
-
-    if ( lpn == lnw ) then
-      lpn = lp
-    end if
-
-    do i = nn, 1, -1
-      if ( lend(i) == lnw ) then
-        lend(i) = lp
-        exit
-      end if
-    end do
-
-    do i = lnw-1, 1, -1
-      if ( lptr(i) == lnw ) then
-        lptr(i) = lp
-      end if
-    end do
-
-  end do
-!
-!  Update N and LNEW, and optimize the patch of triangles
-!  containing K (on input) by applying swaps to the arcs in IWK.
-!
-  n = nn
-  lnew = lnw
-
-  if ( 0 < iwl ) then
-
-    nit = 4 * iwl
-
-    call optim ( x, y, z, iwl, list, lptr, lend, nit, iwk, ierr )
-
-    if ( ierr /= 0 .and. ierr /= 1 ) then
-      ier = 5
-      return
-    end if
-
-    if ( ierr == 1 ) then
-      ier = 6
-      return
-    end if
-
-  end if
-
-  ier = 0
-
-  return
-end
-subroutine edge ( in1, in2, x, y, z, lwk, iwk, list, lptr, lend, ier )
-
-!*****************************************************************************80
-!
-!! EDGE swaps arcs to force two nodes to be adjacent.
-!
-!  Discussion:
-!
-!    Given a triangulation of N nodes and a pair of nodal
-!    indexes IN1 and IN2, this routine swaps arcs as necessary
-!    to force IN1 and IN2 to be adjacent.  Only arcs which
-!    intersect IN1-IN2 are swapped out.  If a Delaunay triangu-
-!    lation is input, the resulting triangulation is as close
-!    as possible to a Delaunay triangulation in the sense that
-!    all arcs other than IN1-IN2 are locally optimal.
-!
-!    A sequence of calls to EDGE may be used to force the
-!    presence of a set of edges defining the boundary of a
-!    non-convex and/or multiply connected region, or to introduce
-!    barriers into the triangulation.  Note that
-!    GETNP will not necessarily return closest nodes if the
-!    triangulation has been constrained by a call to EDGE.
-!    However, this is appropriate in some applications, such
-!    as triangle-based interpolation on a nonconvex domain.
-!
-!  Modified:
-!
-!    17 June 2002
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) IN1, IN2, indexes (of X, Y, and Z) in the
-!    range 1 to N defining a pair of nodes to be connected by an arc.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes.
-!
-!    Input/output, integer ( kind = 4 ) LWK.  On input, the number of columns
-!    reserved for IWK.  This must be at least NI, the number of arcs that
-!    intersect IN1-IN2.  (NI is bounded by N-3.)   On output, the number of
-!    arcs which intersect IN1-IN2 (but not more than the input value of LWK)
-!    unless IER = 1 or IER = 3.  LWK = 0 if and only if IN1 and IN2 were
-!    adjacent (or LWK=0) on input.
-!
-!    Output, integer ( kind = 4 ) IWK(2*LWK), the indexes of the endpoints of
-!    the new arcs other than IN1-IN2 unless 0 < IER or LWK = 0.  New arcs to
-!    the left of IN1->IN2 are stored in the first K-1 columns (left portion
-!    of IWK), column K contains zeros, and new arcs to the right of IN1->IN2
-!    occupy columns K+1,...,LWK.  (K can be determined by searching IWK
-!    for the zeros.)
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    the data structure defining the triangulation, created by TRMESH.  On
-!    output, updated if necessary to reflect the presence of an arc connecting
-!    IN1 and IN2 unless 0 < IER.  The data structure has been altered if
-!    4 <= IER.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if IN1 < 1, IN2 < 1, IN1 = IN2, or LWK < 0 on input.
-!    2, if more space is required in IWK.  Refer to LWK.
-!    3, if IN1 and IN2 could not be connected due to either an invalid
-!      data structure or collinear nodes (and floating point error).
-!    4, if an error flag other than IER = 1 was returned by OPTIM.
-!    5, if error flag 1 was returned by OPTIM.  This is not necessarily
-!      an error, but the arcs other than IN1-IN2 may not be optimal.
-!
-!  Local parameters:
-!
-!    DPij =     Dot product <Ni,Nj>
-!    I =        DO-loop index and column index for IWK
-!    IERR =     Error flag returned by Subroutine OPTIM
-!    IWC =      IWK index between IWF and IWL -- NL->NR is
-!               stored in IWK(1,IWC)->IWK(2,IWC)
-!    IWCP1 =    IWC + 1
-!    IWEND =    Input or output value of LWK
-!    IWF =      IWK (column) index of the first (leftmost) arc
-!               which intersects IN1->IN2
-!    IWL =      IWK (column) index of the last (rightmost) are
-!               which intersects IN1->IN2
-!    LFT =      Flag used to determine if a swap results in the
-!               new arc intersecting IN1-IN2 -- LFT = 0 iff
-!               N0 = IN1, LFT = -1 implies N0 LEFT IN1->IN2,
-!               and LFT = 1 implies N0 LEFT IN2->IN1
-!    LP =       List pointer (index for LIST and LPTR)
-!    LP21 =     Unused parameter returned by SWAP
-!    LPL =      Pointer to the last neighbor of IN1 or NL
-!    N0 =       Neighbor of N1 or node opposite NR->NL
-!    N1,N2 =    Local copies of IN1 and IN2
-!    N1FRST =   First neighbor of IN1
-!    N1LST =    (Signed) last neighbor of IN1
-!    NEXT =     Node opposite NL->NR
-!    NIT =      Flag or number of iterations employed by OPTIM
-!    NL,NR =    Endpoints of an arc which intersects IN1-IN2
-!               with NL LEFT IN1->IN2
-!    X0,Y0,Z0 = Coordinates of N0
-!    X1,Y1,Z1 = Coordinates of IN1
-!    X2,Y2,Z2 = Coordinates of IN2
-!
-  implicit none
-
-  real    ( kind = 8 ) dp12
-  real    ( kind = 8 ) dp1l
-  real    ( kind = 8 ) dp1r
-  real    ( kind = 8 ) dp2l
-  real    ( kind = 8 ) dp2r
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) in1
-  integer ( kind = 4 ) in2
-  integer ( kind = 4 ) iwc
-  integer ( kind = 4 ) iwcp1
-  integer ( kind = 4 ) iwend
-  integer ( kind = 4 ) iwf
-  integer ( kind = 4 ) iwk(2,*)
-  integer ( kind = 4 ) iwl
-  logical left
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) lft
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lwk
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n1frst
-  integer ( kind = 4 ) n1lst
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nit
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ) nr
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-!
-!  Store IN1, IN2, and LWK in local variables and test for errors.
-!
-  n1 = in1
-  n2 = in2
-  iwend = lwk
-
-  if ( n1 < 1 .or. n2 < 1 .or. n1 == n2  .or. iwend < 0 ) then
-    ier = 1
-    return
-  end if
-!
-!  Test for N2 as a neighbor of N1.  LPL points to the last neighbor of N1.
-!
-  lpl = lend(n1)
-  n0 = abs ( list(lpl) )
-  lp = lpl
-
-  do
-
-    if ( n0 == n2 ) then
-      ier = 0
-      return
-    end if
-
-    lp = lptr(lp)
-    n0 = list(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-  end do
-!
-!  Initialize parameters.
-!
-  iwl = 0
-  nit = 0
-!
-!  Store the coordinates of N1 and N2.
-!
-  do
-
-    x1 = x(n1)
-    y1 = y(n1)
-    z1 = z(n1)
-
-    x2 = x(n2)
-    y2 = y(n2)
-    z2 = z(n2)
-!
-!  Set NR and NL to adjacent neighbors of N1 such that
-!  NR LEFT N2->N1 and NL LEFT N1->N2,
-!  (NR Forward N1->N2 or NL Forward N1->N2), and
-!  (NR Forward N2->N1 or NL Forward N2->N1).
-!
-!  Initialization:  Set N1FRST and N1LST to the first and
-!  (signed) last neighbors of N1, respectively, and
-!  initialize NL to N1FRST.
-!
-    lpl = lend(n1)
-    n1lst = list(lpl)
-    lp = lptr(lpl)
-    n1frst = list(lp)
-    nl = n1frst
-
-    if ( n1lst < 0 ) then
-      go to 4
-    end if
-!
-!  N1 is an interior node.  Set NL to the first candidate
-!  for NR (NL LEFT N2->N1).
-!
-    do
-
-      if ( left ( x2, y2, z2, x1, y1, z1, x(nl), y(nl), z(nl) ) ) then
-        go to 4
-      end if
-
-      lp = lptr(lp)
-      nl = list(lp)
-
-      if ( nl == n1frst ) then
-        exit
-      end if
-
-    end do
-!
-!  All neighbors of N1 are strictly left of N1->N2.
-!
-    go to 5
-!
-!  NL = LIST(LP) LEFT N2->N1.  Set NR to NL and NL to the
-!  following neighbor of N1.
-!
-4   continue
-
-    do
-
-      nr = nl
-      lp = lptr(lp)
-      nl = abs ( list(lp) )
-!
-!  NL LEFT N1->N2 and NR LEFT N2->N1.  The Forward tests
-!  are employed to avoid an error associated with
-!  collinear nodes.
-!
-      if ( left ( x1, y1, z1, x2, y2, z2, x(nl), y(nl), z(nl) ) ) then
-
-        dp12 = x1 * x2 + y1 * y2 + z1 * z2
-        dp1l = x1 * x(nl) + y1 * y(nl) + z1 * z(nl)
-        dp2l = x2 * x(nl) + y2 * y(nl) + z2 * z(nl)
-        dp1r = x1 * x(nr) + y1 * y(nr) + z1 * z(nr)
-        dp2r = x2 * x(nr) + y2 * y(nr) + z2 * z(nr)
-
-        if ( ( 0.0D+00 <= dp2l - dp12 * dp1l .or. &
-               0.0D+00 <= dp2r - dp12 * dp1r )  .and. &
-             ( 0.0D+00 <= dp1l - dp12 * dp2l .or.  &
-               0.0D+00 <= dp1r - dp12 * dp2r ) ) then
-          go to 6
-        end if
-!
-!  NL-NR does not intersect N1-N2.  However, there is
-!  another candidate for the first arc if NL lies on
-!  the line N1-N2.
-!
-        if ( .not. left ( x2, y2, z2, x1, y1, z1, x(nl), y(nl), z(nl) ) ) then
-          exit
-        end if
-
-      end if
-!
-!  Bottom of loop.
-!
-      if ( nl == n1frst ) then
-        exit
-      end if
-
-    end do
-!
-!  Either the triangulation is invalid or N1-N2 lies on the
-!  convex hull boundary and an edge NR->NL (opposite N1 and
-!  intersecting N1-N2) was not found due to floating point
-!  error.  Try interchanging N1 and N2 -- NIT > 0 iff this
-!  has already been done.
-!
-5   continue
-
-    if ( 0 < nit ) then
-      ier = 3
-      return
-    end if
-
-    nit = 1
-    call i4_swap ( n1, n2 )
-
-  end do
-!
-!  Store the ordered sequence of intersecting edges NL->NR in
-!  IWK(1,IWL)->IWK(2,IWL).
-!
-6 continue
-
-  iwl = iwl + 1
-
-  if ( iwend < iwl ) then
-    ier = 2
-    return
-  end if
-
-  iwk(1,iwl) = nl
-  iwk(2,iwl) = nr
-!
-!  Set NEXT to the neighbor of NL which follows NR.
-!
-  lpl = lend(nl)
-  lp = lptr(lpl)
-!
-!  Find NR as a neighbor of NL.  The search begins with the first neighbor.
-!
-  do
-
-    if ( list(lp) == nr ) then
-      go to 8
-    end if
-
-    lp = lptr(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-  end do
-!
-!  NR must be the last neighbor, and NL->NR cannot be a boundary edge.
-!
-  if ( list(lp) /= nr ) then
-    ier = 3
-    return
-  end if
-!
-!  Set NEXT to the neighbor following NR, and test for
-!  termination of the store loop.
-!
-8 continue
-
-  lp = lptr(lp)
-  next = abs ( list(lp) )
-!
-!  Set NL or NR to NEXT.
-!
-  if ( next /= n2 ) then
-
-    if ( left ( x1, y1, z1, x2, y2, z2, x(next), y(next), z(next) ) ) then
-      nl = next
-    else
-      nr = next
-    end if
-
-    go to 6
-
-  end if
-!
-!  IWL is the number of arcs which intersect N1-N2.
-!  Store LWK.
-!
-9 continue
-
-  lwk = iwl
-  iwend = iwl
-!
-!  Initialize for edge swapping loop -- all possible swaps
-!  are applied (even if the new arc again intersects
-!  N1-N2), arcs to the left of N1->N2 are stored in the
-!  left portion of IWK, and arcs to the right are stored in
-!  the right portion.  IWF and IWL index the first and last
-!  intersecting arcs.
-!
-  iwf = 1
-!
-!  Top of loop -- set N0 to N1 and NL->NR to the first edge.
-!  IWC points to the arc currently being processed.  LFT
-!  <= 0 iff N0 LEFT N1->N2.
-!
-10 continue
-
-  lft = 0
-  n0 = n1
-  x0 = x1
-  y0 = y1
-  z0 = z1
-  nl = iwk(1,iwf)
-  nr = iwk(2,iwf)
-  iwc = iwf
-!
-!  Set NEXT to the node opposite NL->NR unless IWC is the last arc.
-!
-11 continue
-
-  if (iwc == iwl) then
-    go to 21
-  end if
-
-  iwcp1 = iwc + 1
-  next = iwk(1,iwcp1)
-
-  if ( next /= nl ) then
-    go to 16
-  end if
-
-  next = iwk(2,iwcp1)
-!
-!  NEXT RIGHT N1->N2 and IWC < IWL.  Test for a possible swap.
-!
-  if ( .not. left ( x0, y0, z0, x(nr), y(nr), z(nr), x(next), &
-                  y(next), z(next) ) ) then
-    go to 14
-  end if
-
-  if ( 0 <= lft ) then
-    go to 12
-  end if
-
-  if ( .not. left ( x(nl), y(nl), z(nl), x0, y0, z0, x(next), &
-                  y(next), z(next) ) ) then
-    go to 14
-  end if
-!
-!  Replace NL->NR with N0->NEXT.
-!
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwc) = n0
-  iwk(2,iwc) = next
-  go to 15
-!
-!  Swap NL-NR for N0-NEXT, shift columns IWC+1,...,IWL to
-!  the left, and store N0-NEXT in the right portion of IWK.
-!
-12 continue
-
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-
-  do i = iwcp1, iwl
-    iwk(1,i-1) = iwk(1,i)
-    iwk(2,i-1) = iwk(2,i)
-  end do
-
-  iwk(1,iwl) = n0
-  iwk(2,iwl) = next
-  iwl = iwl - 1
-  nr = next
-  go to 11
-!
-!  A swap is not possible.  Set N0 to NR.
-!
-14 continue
-
-  n0 = nr
-  x0 = x(n0)
-  y0 = y(n0)
-  z0 = z(n0)
-  lft = 1
-!
-!  Advance to the next arc.
-!
-15 continue
-
-  nr = next
-  iwc = iwc + 1
-  go to 11
-!
-!  NEXT LEFT N1->N2, NEXT .NE. N2, and IWC < IWL.
-!  Test for a possible swap.
-!
-16 continue
-
-  if ( .not. &
-    left ( x(nl), y(nl), z(nl), x0, y0, z0, x(next), y(next), z(next) ) ) then
-    go to 19
-  end if
-
-  if ( lft <= 0 ) then
-    go to 17
-  end if
-
-  if ( .not. &
-    left ( x0, y0, z0, x(nr), y(nr), z(nr), x(next), y(next), z(next) ) ) then
-    go to 19
-  end if
-!
-!  Replace NL->NR with NEXT->N0.
-!
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwc) = next
-  iwk(2,iwc) = n0
-  go to 20
-!
-!  Swap NL-NR for N0-NEXT, shift columns IWF,...,IWC-1 to
-!  the right, and store N0-NEXT in the left portion of IWK.
-!
-17 continue
-
-  call swap ( next, n0, nl, nr, list, lptr, lend, lp21 )
-
-  do i = iwc-1, iwf, -1
-    iwk(1,i+1) = iwk(1,i)
-    iwk(2,i+1) = iwk(2,i)
-  end do
-
-  iwk(1,iwf) = n0
-  iwk(2,iwf) = next
-  iwf = iwf + 1
-  go to 20
-!
-!  A swap is not possible.  Set N0 to NL.
-!
-19 continue
-
-  n0 = nl
-  x0 = x(n0)
-  y0 = y(n0)
-  z0 = z(n0)
-  lft = -1
-!
-!  Advance to the next arc.
-!
-20 continue
-
-  nl = next
-  iwc = iwc + 1
-  go to 11
-!
-!  N2 is opposite NL->NR (IWC = IWL).
-!
-21 continue
-
-  if ( n0 == n1 ) then
-    go to 24
-  end if
-
-  if ( lft < 0 ) then
-    go to 22
-  end if
-!
-!  N0 RIGHT N1->N2.  Test for a possible swap.
-!
-  if ( .not. left ( x0, y0, z0, x(nr), y(nr), z(nr), x2, y2, z2 ) ) then
-    go to 10
-  end if
-!
-!  Swap NL-NR for N0-N2 and store N0-N2 in the right portion of IWK.
-!
-  call swap ( n2, n0, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwl) = n0
-  iwk(2,iwl) = n2
-  iwl = iwl - 1
-  go to 10
-!
-!  N0 LEFT N1->N2.  Test for a possible swap.
-!
-22 continue
-
-  if ( .not. left ( x(nl), y(nl), z(nl), x0, y0, z0, x2, y2, z2 ) ) then
-    go to 10
-  end if
-!
-!  Swap NL-NR for N0-N2, shift columns IWF,...,IWL-1 to the
-!  right, and store N0-N2 in the left portion of IWK.
-!
-  call swap ( n2, n0, nl, nr, list, lptr, lend, lp21 )
-  i = iwl
-
-  do
-
-    iwk(1,i) = iwk(1,i-1)
-    iwk(2,i) = iwk(2,i-1)
-    i = i - 1
-
-    if ( i <= iwf ) then
-      exit
-    end if
-
-  end do
-
-  iwk(1,iwf) = n0
-  iwk(2,iwf) = n2
-  iwf = iwf + 1
-  go to 10
-!
-!  IWF = IWC = IWL.  Swap out the last arc for N1-N2 and store zeros in IWK.
-!
-24 continue
-
-  call swap ( n2, n1, nl, nr, list, lptr, lend, lp21 )
-  iwk(1,iwc) = 0
-  iwk(2,iwc) = 0
-!
-!  Optimization procedure.
-!
-!  Optimize the set of new arcs to the left of IN1->IN2.
-!
-  ier = 0
-
-  if ( 1 < iwc ) then
-
-    nit = 4 * ( iwc - 1 )
-
-    call optim ( x, y, z, iwc-1, list, lptr, lend, nit, iwk, ierr )
-
-    if ( ierr /= 0 .and. ierr /= 1 ) then
-      ier = 4
-      return
-    end if
-
-    if ( ierr == 1 ) then
-      ier = 5
-    end if
-
-  end if
-!
-!  Optimize the set of new arcs to the right of IN1->IN2.
-!
-  if ( iwc < iwend ) then
-
-    nit = 4 * ( iwend - iwc )
-
-    call optim ( x, y, z, iwend-iwc, list, lptr, lend, nit, iwk(1,iwc+1), ierr )
-
-    if ( ierr /= 0 .and. ierr /= 1) then
-      ier = 4
-      return
-    end if
-
-    if ( ierr == 1 ) then
-      ier = 5
-      return
-    end if
-
-  end if
-
-  if ( ier == 5 ) then
-    ier = 5
-    return
-  end if
-
-  return
-end
-subroutine getnp ( x, y, z, list, lptr, lend, l, npts, df, ier )
-
-!*****************************************************************************80
-!
-!! GETNP gets the next nearest node to a given node.
-!
-!  Discussion:
-!
-!    Given a Delaunay triangulation of N nodes on the unit
-!    sphere and an array NPTS containing the indexes of L-1
-!    nodes ordered by angular distance from NPTS(1), this
-!    routine sets NPTS(L) to the index of the next node in the
-!    sequence -- the node, other than NPTS(1),...,NPTS(L-1),
-!    that is closest to NPTS(1).  Thus, the ordered sequence
-!    of K closest nodes to N1 (including N1) may be determined
-!    by K-1 calls to GETNP with NPTS(1) = N1 and L = 2,3,...,K
-!    for K >= 2.
-!
-!    The algorithm uses the property of a Delaunay triangula-
-!    tion that the K-th closest node to N1 is a neighbor of one
-!    of the K-1 closest nodes to N1.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the
-!    triangulation data structure, created by TRMESH.
-!
-!    Input, integer ( kind = 4 ) L, the number of nodes in the sequence on
-!    output.  2 <= L <= N.
-!
-!    Input/output, integer ( kind = 4 ) NPTS(L).  On input, the indexes of
-!    the L-1 closest nodes to NPTS(1) in the first L-1 locations.  On output,
-!    updated with the index of the L-th closest node to NPTS(1) in
-!    position L unless IER = 1.
-!
-!    Output, real ( kind = 8 ) DF, value of an increasing function (negative
-!    cosine) of the angular distance between NPTS(1) and NPTS(L) unless IER = 1.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if L < 2.
-!
-!  Local parameters:
-!
-!    DNB,DNP =  Negative cosines of the angular distances from
-!               N1 to NB and to NP, respectively
-!    I =        NPTS index and DO-loop index
-!    LM1 =      L-1
-!    LP =       LIST pointer of a neighbor of NI
-!    LPL =      Pointer to the last neighbor of NI
-!    N1 =       NPTS(1)
-!    NB =       Neighbor of NI and candidate for NP
-!    NI =       NPTS(I)
-!    NP =       Candidate for NPTS(L)
-!    X1,Y1,Z1 = Coordinates of N1
-!
-  implicit none
-
-  integer ( kind = 4 ) l
-
-  real    ( kind = 8 ) df
-  real    ( kind = 8 ) dnb
-  real    ( kind = 8 ) dnp
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) ni
-  integer ( kind = 4 ) np
-  integer ( kind = 4 ) npts(l)
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z1
-
-  if ( l < 2 ) then
-    ier = 1
-    return
-  end if
-
-  ier = 0
-!
-!  Store N1 = NPTS(1) and mark the elements of NPTS.
-!
-  n1 = npts(1)
-  x1 = x(n1)
-  y1 = y(n1)
-  z1 = z(n1)
-
-  do i = 1, l-1
-    ni = npts(i)
-    lend(ni) = -lend(ni)
-  end do
-!
-!  Candidates for NP = NPTS(L) are the unmarked neighbors
-!  of nodes in NPTS.  DNP is initially greater than -cos(PI)
-!  (the maximum distance).
-!
-  dnp = 2.0D+00
-!
-!  Loop on nodes NI in NPTS.
-!
-  do i = 1, l-1
-
-    ni = npts(i)
-    lpl = -lend(ni)
-    lp = lpl
-!
-!  Loop on neighbors NB of NI.
-!
-    do
-
-      nb = abs ( list(lp) )
-!
-!  NB is an unmarked neighbor of NI.  Replace NP if NB is closer to N1.
-!
-      if ( 0 <= lend(nb) ) then
-        dnb = - ( x(nb) * x1 + y(nb) * y1 + z(nb) * z1 )
-        if ( dnb < dnp ) then
-          np = nb
-          dnp = dnb
-        end if
-      end if
-
-      lp = lptr(lp)
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-
-  npts(l) = np
-  df = dnp
-!
-!  Unmark the elements of NPTS.
-!
-  do i = 1, l-1
-    ni = npts(i)
-    lend(ni) = -lend(ni)
-  end do
-
-  return
-end
-subroutine i4_swap ( i, j )
-
-!*****************************************************************************80
-!
-!! I4_SWAP swaps two integer values.
-!
-!  Modified:
-!
-!    30 November 1998
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input/output, integer ( kind = 4 ) I, J.  On output, the values of I and
-!    J have been interchanged.
-!
-  implicit none
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) k
-
-  k = i
-  i = j
-  j = k
-
-  return
-end
-subroutine insert ( k, lp, list, lptr, lnew )
-
-!*****************************************************************************80
-!
-!! INSERT inserts K as a neighbor of N1.
-!
-!  Discussion:
-!
-!    This subroutine inserts K as a neighbor of N1 following
-!    N2, where LP is the LIST pointer of N2 as a neighbor of
-!    N1.  Note that, if N2 is the last neighbor of N1, K will
-!    become the first neighbor (even if N1 is a boundary node).
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) K, the index of the node to be inserted.
-!
-!    Input, integer ( kind = 4 ) LP, the LIST pointer of N2 as a neighbor of N1.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LNEW,
-!    the data structure defining the triangulation, created by TRMESH.
-!    On output, updated with the addition of node K.
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lsav
-
-  lsav = lptr(lp)
-  lptr(lp) = lnew
-  list(lnew) = k
-  lptr(lnew) = lsav
-  lnew = lnew + 1
-
-  return
-end
-function inside ( p, lv, xv, yv, zv, nv, listv, ier )
-
-!*****************************************************************************80
-!
-!! INSIDE determines if a point is inside a polygonal region.
-!
-!  Discussion:
-!
-!    This function locates a point P relative to a polygonal
-!    region R on the surface of the unit sphere, returning
-!    INSIDE = TRUE if and only if P is contained in R.  R is
-!    defined by a cyclically ordered sequence of vertices which
-!    form a positively-oriented simple closed curve.  Adjacent
-!    vertices need not be distinct but the curve must not be
-!    self-intersecting.  Also, while polygon edges are by definition
-!    restricted to a single hemisphere, R is not so
-!    restricted.  Its interior is the region to the left as the
-!    vertices are traversed in order.
-!
-!    The algorithm consists of selecting a point Q in R and
-!    then finding all points at which the great circle defined
-!    by P and Q intersects the boundary of R.  P lies inside R
-!    if and only if there is an even number of intersection
-!    points between Q and P.  Q is taken to be a point immediately
-!    to the left of a directed boundary edge -- the first
-!    one that results in no consistency-check failures.
-!
-!    If P is close to the polygon boundary, the problem is
-!    ill-conditioned and the decision may be incorrect.  Also,
-!    an incorrect decision may result from a poor choice of Q
-!    (if, for example, a boundary edge lies on the great circle
-!    defined by P and Q).  A more reliable result could be
-!    obtained by a sequence of calls to INSIDE with the vertices
-!    cyclically permuted before each call (to alter the
-!    choice of Q).
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) P(3), the coordinates of the point (unit vector)
-!    to be located.
-!
-!    Input, integer ( kind = 4 ) LV, the length of arrays XV, YV, and ZV.
-!
-!    Input, real ( kind = 8 ) XV(LV), YV(LV), ZV(LV), the coordinates of unit
-!    vectors (points on the unit sphere).
-!
-!    Input, integer ( kind = 4 ) NV, the number of vertices in the polygon.
-!    3 <= NV <= LV.
-!
-!    Input, integer ( kind = 4 ) LISTV(NV), the indexes (for XV, YV, and ZV)
-!    of a cyclically-ordered (and CCW-ordered) sequence of vertices that
-!    define R.  The last vertex (indexed by LISTV(NV)) is followed by the
-!    first (indexed by LISTV(1)).  LISTV entries must be in the range 1 to LV.
-!
-!    Output, logical INSIDE, TRUE if and only if P lies inside R unless
-!    IER /= 0, in which case the value is not altered.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if LV or NV is outside its valid range.
-!    2, if a LISTV entry is outside its valid range.
-!    3, if the polygon boundary was found to be self-intersecting.  This
-!      error will not necessarily be detected.
-!    4, if every choice of Q (one for each boundary edge) led to failure of
-!      some internal consistency check.  The most likely cause of this error
-!      is invalid input:  P = (0,0,0), a null or self-intersecting polygon, etc.
-!
-!  Local parameters:
-!
-!    B =         Intersection point between the boundary and
-!                the great circle defined by P and Q.
-!
-!    BP,BQ =     <B,P> and <B,Q>, respectively, maximized over
-!                intersection points B that lie between P and
-!                Q (on the shorter arc) -- used to find the
-!                closest intersection points to P and Q
-!    CN =        Q X P = normal to the plane of P and Q
-!    D =         Dot product <B,P> or <B,Q>
-!    EPS =       Parameter used to define Q as the point whose
-!                orthogonal distance to (the midpoint of)
-!                boundary edge V1->V2 is approximately EPS/
-!                (2*Cos(A/2)), where <V1,V2> = Cos(A).
-!    EVEN =      TRUE iff an even number of intersection points
-!                lie between P and Q (on the shorter arc)
-!    I1,I2 =     Indexes (LISTV elements) of a pair of adjacent
-!                boundary vertices (endpoints of a boundary
-!                edge)
-!    IERR =      Error flag for calls to INTRSC (not tested)
-!    IMX =       Local copy of LV and maximum value of I1 and I2
-!    K =         DO-loop index and LISTV index
-!    K0 =        LISTV index of the first endpoint of the
-!                boundary edge used to compute Q
-!    LFT1,LFT2 = Logical variables associated with I1 and I2 in
-!                the boundary traversal:  TRUE iff the vertex
-!                is strictly to the left of Q->P (<V,CN> > 0)
-!    N =         Local copy of NV
-!    NI =        Number of intersections (between the boundary
-!                curve and the great circle P-Q) encountered
-!    PINR =      TRUE iff P is to the left of the directed
-!                boundary edge associated with the closest
-!                intersection point to P that lies between P
-!                and Q (a left-to-right intersection as
-!                viewed from Q), or there is no intersection
-!                between P and Q (on the shorter arc)
-!    PN,QN =     P X CN and CN X Q, respectively:  used to
-!                locate intersections B relative to arc Q->P
-!    Q =         (V1 + V2 + EPS*VN/VNRM)/QNRM, where V1->V2 is
-!                the boundary edge indexed by LISTV(K0) ->
-!                LISTV(K0+1)
-!    QINR =      TRUE iff Q is to the left of the directed
-!                boundary edge associated with the closest
-!                intersection point to Q that lies between P
-!                and Q (a right-to-left intersection as
-!                viewed from Q), or there is no intersection
-!                between P and Q (on the shorter arc)
-!    QNRM =      Euclidean norm of V1+V2+EPS*VN/VNRM used to
-!                compute (normalize) Q
-!    V1,V2 =     Vertices indexed by I1 and I2 in the boundary
-!                traversal
-!    VN =        V1 X V2, where V1->V2 is the boundary edge
-!                indexed by LISTV(K0) -> LISTV(K0+1)
-!    VNRM =      Euclidean norm of VN
-!
-  implicit none
-
-  integer ( kind = 4 ) lv
-  integer ( kind = 4 ) nv
-
-  real    ( kind = 8 ) b(3)
-  real    ( kind = 8 ) bp
-  real    ( kind = 8 ) bq
-  real    ( kind = 8 ) cn(3)
-  real    ( kind = 8 ) d
-  real    ( kind = 8 ), parameter :: eps = 0.001D+00
-  logical even
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ierr
-  integer ( kind = 4 ) imx
-  logical inside
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) k0
-  logical lft1
-  logical lft2
-  integer ( kind = 4 ) listv(nv)
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) ni
-  real    ( kind = 8 ) p(3)
-  logical pinr
-  real    ( kind = 8 ) pn(3)
-  real    ( kind = 8 ) q(3)
-  logical qinr
-  real    ( kind = 8 ) qn(3)
-  real    ( kind = 8 ) qnrm
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) vn(3)
-  real    ( kind = 8 ) vnrm
-  real    ( kind = 8 ) xv(lv)
-  real    ( kind = 8 ) yv(lv)
-  real    ( kind = 8 ) zv(lv)
-!
-!  Store local parameters.
-!
-  imx = lv
-  n = nv
-!
-!  Test for error 1.
-!
-  if ( n < 3 .or. imx < n ) then
-    ier = 1
-    return
-  end if
-!
-!  Initialize K0.
-!
-  k0 = 0
-  i1 = listv(1)
-
-  if ( i1 < 1 .or. imx < i1 ) then
-    ier = 2
-    return
-  end if
-!
-!  Increment K0 and set Q to a point immediately to the left
-!  of the midpoint of edge V1->V2 = LISTV(K0)->LISTV(K0+1):
-!  Q = (V1 + V2 + EPS*VN/VNRM)/QNRM, where VN = V1 X V2.
-!
-1 continue
-
-  k0 = k0 + 1
-
-  if ( n < k0 ) then
-    ier = 4
-    return
-  end if
-
-  i1 = listv(k0)
-
-  if ( k0 < n ) then
-    i2 = listv(k0+1)
-  else
-    i2 = listv(1)
-  end if
-
-  if ( i2 < 1 .or. imx < i2 ) then
-    ier = 2
-    return
-  end if
-
-  vn(1) = yv(i1) * zv(i2) - zv(i1) * yv(i2)
-  vn(2) = zv(i1) * xv(i2) - xv(i1) * zv(i2)
-  vn(3) = xv(i1) * yv(i2) - yv(i1) * xv(i2)
-  vnrm = sqrt ( sum ( vn(1:3)**2 ) )
-
-  if ( vnrm == 0.0D+00 ) then
-    go to 1
-  end if
-
-  q(1) = xv(i1) + xv(i2) + eps * vn(1) / vnrm
-  q(2) = yv(i1) + yv(i2) + eps * vn(2) / vnrm
-  q(3) = zv(i1) + zv(i2) + eps * vn(3) / vnrm
-
-  qnrm = sqrt ( sum ( q(1:3)**2 ) )
-
-  q(1) = q(1) / qnrm
-  q(2) = q(2) / qnrm
-  q(3) = q(3) / qnrm
-!
-!  Compute CN = Q X P, PN = P X CN, and QN = CN X Q.
-!
-  cn(1) = q(2) * p(3) - q(3) * p(2)
-  cn(2) = q(3) * p(1) - q(1) * p(3)
-  cn(3) = q(1) * p(2) - q(2) * p(1)
-
-  if ( cn(1) == 0.0D+00 .and. cn(2) == 0.0D+00  .and. cn(3) == 0.0D+00 ) then
-    go to 1
-  end if
-
-  pn(1) = p(2) * cn(3) - p(3) * cn(2)
-  pn(2) = p(3) * cn(1) - p(1) * cn(3)
-  pn(3) = p(1) * cn(2) - p(2) * cn(1)
-  qn(1) = cn(2) * q(3) - cn(3) * q(2)
-  qn(2) = cn(3) * q(1) - cn(1) * q(3)
-  qn(3) = cn(1) * q(2) - cn(2) * q(1)
-!
-!  Initialize parameters for the boundary traversal.
-!
-  ni = 0
-  even = .true.
-  bp = -2.0D+00
-  bq = -2.0D+00
-  pinr = .true.
-  qinr = .true.
-  i2 = listv(n)
-
-  if ( i2 < 1 .or. imx < i2 ) then
-    ier = 2
-    return
-  end if
-
-  lft2 = 0.0D+00 < cn(1) * xv(i2) + cn(2) * yv(i2) + cn(3) * zv(i2)
-!
-!  Loop on boundary arcs I1->I2.
-!
-  do k = 1, n
-
-    i1 = i2
-    lft1 = lft2
-    i2 = listv(k)
-
-    if ( i2 < 1 .or. imx < i2 ) then
-      ier = 2
-      return
-    end if
-
-    lft2 = ( 0.0D+00 < cn(1) * xv(i2) + cn(2) * yv(i2) + cn(3) * zv(i2) )
-
-    if ( lft1 .eqv. lft2 ) then
-      cycle
-    end if
-!
-!  I1 and I2 are on opposite sides of Q->P.  Compute the
-!  point of intersection B.
-!
-    ni = ni + 1
-    v1(1) = xv(i1)
-    v1(2) = yv(i1)
-    v1(3) = zv(i1)
-    v2(1) = xv(i2)
-    v2(2) = yv(i2)
-    v2(3) = zv(i2)
-
-    call intrsc ( v1, v2, cn, b, ierr )
-!
-!  B is between Q and P (on the shorter arc) iff
-!  B Forward Q->P and B Forward P->Q       iff
-!  <B,QN> > 0 and 0 < <B,PN>.
-!
-    if ( 0.0D+00 < dot_product ( b(1:3), qn(1:3) ) .and. &
-         0.0D+00 < dot_product ( b(1:3), pn(1:3) ) ) then
-!
-!  Update EVEN, BQ, QINR, BP, and PINR.
-!
-      even = .not. even
-      d = dot_product ( b(1:3), q(1:3) )
-
-      if ( bq < d ) then
-        bq = d
-        qinr = lft2
-      end if
-
-      d = dot_product ( b(1:3), p(1:3) )
-
-      if ( bp < d ) then
-        bp = d
-        pinr = lft1
-      end if
-
-    end if
-
-  end do
-!
-!  Test for consistency:  NI must be even and QINR must be TRUE.
-!
-  if ( ni /= 2 * ( ni / 2 ) .or. .not. qinr ) then
-    go to 1
-  end if
-!
-!  Test for error 3:  different values of PINR and EVEN.
-!
-  if ( pinr .neqv. even ) then
-    ier = 3
-    return
-  end if
-
-  ier = 0
-  inside = even
-
-  return
-end
-subroutine intadd ( kk, i1, i2, i3, list, lptr, lend, lnew )
-
-!*****************************************************************************80
-!
-!! INTADD adds an interior node to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine adds an interior node to a triangulation
-!    of a set of points on the unit sphere.  The data structure
-!    is updated with the insertion of node KK into the triangle
-!    whose vertices are I1, I2, and I3.  No optimization of the
-!    triangulation is performed.
-!
-!    This routine is identical to the similarly named routine in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) KK, the index of the node to be inserted.
-!    1 <= KK and KK must not be equal to I1, I2, or I3.
-!
-!    Input, integer ( kind = 4 ) I1, I2, I3, indexes of the
-!    counterclockwise-ordered sequence of vertices of a triangle which contains
-!    node KK.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), LNEW,
-!    the data structure defining the triangulation, created by TRMESH.  Triangle
-!    (I1,I2,I3) must be included in the triangulation.
-!    On output, updated with the addition of node KK.  KK
-!    will be connected to nodes I1, I2, and I3.
-!
-!  Local parameters:
-!
-!    K =        Local copy of KK
-!    LP =       LIST pointer
-!    N1,N2,N3 = Local copies of I1, I2, and I3
-!
-  implicit none
-
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) kk
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-
-  k = kk
-!
-!  Initialization.
-!
-  n1 = i1
-  n2 = i2
-  n3 = i3
-!
-!  Add K as a neighbor of I1, I2, and I3.
-!
-  lp = lstptr ( lend(n1), n2, list, lptr )
-  call insert ( k, lp, list, lptr, lnew )
-
-  lp = lstptr ( lend(n2), n3, list, lptr )
-  call insert ( k, lp, list, lptr, lnew )
-
-  lp = lstptr ( lend(n3), n1, list, lptr )
-  call insert ( k, lp, list, lptr, lnew )
-!
-!  Add I1, I2, and I3 as neighbors of K.
-!
-  list(lnew) = n1
-  list(lnew+1) = n2
-  list(lnew+2) = n3
-  lptr(lnew) = lnew + 1
-  lptr(lnew+1) = lnew + 2
-  lptr(lnew+2) = lnew
-  lend(k) = lnew + 2
-  lnew = lnew + 3
-
-  return
-end
-subroutine intrsc ( p1, p2, cn, p, ier )
-
-!*****************************************************************************80
-!
-!! INTSRC finds the intersection of two great circles.
-!
-!  Discussion:
-!
-!    Given a great circle C and points P1 and P2 defining an
-!    arc A on the surface of the unit sphere, where A is the
-!    shorter of the two portions of the great circle C12
-!    associated with P1 and P2, this subroutine returns the point
-!    of intersection P between C and C12 that is closer to A.
-!    Thus, if P1 and P2 lie in opposite hemispheres defined by
-!    C, P is the point of intersection of C with A.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) P1(3), P2(3), the coordinates of unit vectors.
-!
-!    Input, real ( kind = 8 ) CN(3), the coordinates of a nonzero vector
-!    which defines C as the intersection of the plane whose normal is CN
-!    with the unit sphere.  Thus, if C is to be the great circle defined
-!    by P and Q, CN should be P X Q.
-!
-!    Output, real ( kind = 8 ) P(3), point of intersection defined above
-!    unless IER is not 0, in which case P is not altered.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator.
-!    0, if no errors were encountered.
-!    1, if <CN,P1> = <CN,P2>.  This occurs iff P1 = P2 or CN = 0 or there are
-!      two intersection points at the same distance from A.
-!    2, if P2 = -P1 and the definition of A is therefore ambiguous.
-!
-!  Local parameters:
-!
-!    D1 =  <CN,P1>
-!    D2 =  <CN,P2>
-!    I =   DO-loop index
-!    PP =  P1 + T*(P2-P1) = Parametric representation of the
-!          line defined by P1 and P2
-!    PPN = Norm of PP
-!    T =   D1/(D1-D2) = Parameter value chosen so that PP lies
-!          in the plane of C
-!
-  implicit none
-
-  real    ( kind = 8 ) cn(3)
-  real    ( kind = 8 ) d1
-  real    ( kind = 8 ) d2
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  real    ( kind = 8 ) p(3)
-  real    ( kind = 8 ) p1(3)
-  real    ( kind = 8 ) p2(3)
-  real    ( kind = 8 ) pp(3)
-  real    ( kind = 8 ) ppn
-  real    ( kind = 8 ) t
-
-  d1 = dot_product ( cn(1:3), p1(1:3) )
-  d2 = dot_product ( cn(1:3), p2(1:3) )
-
-  if ( d1 == d2 ) then
-    ier = 1
-    return
-  end if
-!
-!  Solve for T such that <PP,CN> = 0 and compute PP and PPN.
-!
-  t = d1 / ( d1 - d2 )
-
-  pp(1:3) = p1(1:3) + t * ( p2(1:3) - p1(1:3) )
-
-  ppn = dot_product ( pp(1:3), pp(1:3) )
-!
-!  PPN = 0 iff PP = 0 iff P2 = -P1 (and T = .5).
-!
-  if ( ppn == 0.0D+00 ) then
-    ier = 2
-    return
-  end if
-
-  ppn = sqrt ( ppn )
-!
-!  Compute P = PP/PPN.
-!
-  p(1:3) = pp(1:3) / ppn
-
-  ier = 0
-
-  return
-end
-function jrand ( n, ix, iy, iz )
-
-!*****************************************************************************80
-!
-!! JRAND returns a random integer between 1 and N.
-!
-!  Discussion:
-!
-!   This function returns a uniformly distributed pseudorandom integer
-!   in the range 1 to N.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Brian Wichmann, David Hill,
-!    An Efficient and Portable Pseudo-random Number Generator,
-!    Applied Statistics,
-!    Volume 31, Number 2, 1982, pages 188-190.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the maximum value to be returned.
-!
-!    Input/output, integer ( kind = 4 ) IX, IY, IZ = seeds initialized to
-!    values in the range 1 to 30,000 before the first call to JRAND, and
-!    not altered between subsequent calls (unless a sequence of random
-!    numbers is to be repeated by reinitializing the seeds).
-!
-!    Output, integer ( kind = 4 ) JRAND, a random integer in the range 1 to N.
-!
-!  Local parameters:
-!
-!    U = Pseudo-random number uniformly distributed in the interval (0,1).
-!    X = Pseudo-random number in the range 0 to 3 whose fractional part is U.
-!
-  implicit none
-
-  integer ( kind = 4 ) ix
-  integer ( kind = 4 ) iy
-  integer ( kind = 4 ) iz
-  integer ( kind = 4 ) jrand
-  integer ( kind = 4 ) n
-  real    ( kind = 8 ) u
-  real    ( kind = 8 ) x
-
-  ix = mod ( 171 * ix, 30269 )
-  iy = mod ( 172 * iy, 30307 )
-  iz = mod ( 170 * iz, 30323 )
-
-  x = ( real ( ix, kind = 8 ) / 30269.0D+00 ) &
-    + ( real ( iy, kind = 8 ) / 30307.0D+00 ) &
-    + ( real ( iz, kind = 8 ) / 30323.0D+00 )
-
-  u = x - int ( x )
-  jrand = real ( n, kind = 8 ) * u + 1.0D+00
-
-  return
-end
-function left ( x1, y1, z1, x2, y2, z2, x0, y0, z0 )
-
-!*****************************************************************************80
-!
-!! LEFT determines whether a node is to the left of a plane through the origin.
-!
-!  Discussion:
-!
-!    This function determines whether node N0 is in the
-!    (closed) left hemisphere defined by the plane containing
-!    N1, N2, and the origin, where left is defined relative to
-!    an observer at N1 facing N2.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X1, Y1, Z1 = Coordinates of N1.
-!
-!    Input, real ( kind = 8 ) X2, Y2, Z2 = Coordinates of N2.
-!
-!    Input, real ( kind = 8 ) X0, Y0, Z0 = Coordinates of N0.
-!
-!    Output, logical LEFT = TRUE if and only if N0 is in the closed
-!    left hemisphere.
-!
-  implicit none
-
-  logical left
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-!
-!  LEFT = TRUE iff <N0,N1 X N2> = det(N0,N1,N2) >= 0.
-!
-  left = x0 * ( y1 * z2 - y2 * z1 ) &
-       - y0 * ( x1 * z2 - x2 * z1 ) &
-       + z0 * ( x1 * y2 - x2 * y1 ) >= 0.0D+00
-
-  return
-end
-function lstptr ( lpl, nb, list, lptr )
-
-!*****************************************************************************80
-!
-!! LSTPTR returns the index of NB in the adjacency list.
-!
-!  Discussion:
-!
-!    This function returns the index (LIST pointer) of NB in
-!    the adjacency list for N0, where LPL = LEND(N0).
-!
-!    This function is identical to the similarly named function in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LPL, is LEND(N0).
-!
-!    Input, integer ( kind = 4 ) NB, index of the node whose pointer is to
-!    be returned.  NB must be connected to N0.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), the data
-!    structure defining the triangulation, created by TRMESH.
-!
-!    Output, integer ( kind = 4 ) LSTPTR, pointer such that LIST(LSTPTR) = NB or
-!    LIST(LSTPTR) = -NB, unless NB is not a neighbor of N0, in which
-!    case LSTPTR = LPL.
-!
-!  Local parameters:
-!
-!    LP = LIST pointer
-!    ND = Nodal index
-!
-  implicit none
-
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nd
-
-  lp = lptr(lpl)
-
-  do
-
-    nd = list(lp)
-
-    if ( nd == nb ) then
-      exit
-    end if
-
-    lp = lptr(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-  end do
-
-  lstptr = lp
-
-  return
-end
-function nbcnt ( lpl, lptr )
-
-!*****************************************************************************80
-!
-!! NBCNT returns the number of neighbors of a node.
-!
-!  Discussion:
-!
-!    This function returns the number of neighbors of a node
-!    N0 in a triangulation created by TRMESH.
-!
-!    The number of neighbors also gives the order of the Voronoi
-!    polygon containing the point.  Thus, a neighbor count of 6
-!    means the node is contained in a 6-sided Voronoi region.
-!
-!    This function is identical to the similarly named function in TRIPACK.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LPL = LIST pointer to the last neighbor of N0;
-!    LPL = LEND(N0).
-!
-!    Input, integer ( kind = 4 ) LPTR(6*(N-2)), pointers associated with LIST.
-!
-!    Output, integer ( kind = 4 ) NBCNT, the number of neighbors of N0.
-!
-!  Local parameters:
-!
-!    K =  Counter for computing the number of neighbors.
-!
-!    LP = LIST pointer
-!
-  implicit none
-
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) nbcnt
-
-  lp = lpl
-  k = 1
-
-  do
-
-    lp = lptr(lp)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-    k = k + 1
-
-  end do
-
-  nbcnt = k
-
-  return
-end
-function nearnd ( p, ist, n, x, y, z, list, lptr, lend, al )
-
-!*****************************************************************************80
-!
-!! NEARND returns the nearest node to a given point.
-!
-!  Discussion:
-!
-!    Given a point P on the surface of the unit sphere and a
-!    Delaunay triangulation created by TRMESH, this
-!    function returns the index of the nearest triangulation
-!    node to P.
-!
-!    The algorithm consists of implicitly adding P to the
-!    triangulation, finding the nearest neighbor to P, and
-!    implicitly deleting P from the triangulation.  Thus, it
-!    is based on the fact that, if P is a node in a Delaunay
-!    triangulation, the nearest node to P is a neighbor of P.
-!
-!    For large values of N, this procedure will be faster than
-!    the naive approach of computing the distance from P to every node.
-!
-!    Note that the number of candidates for NEARND (neighbors of P)
-!    is limited to LMAX defined in the PARAMETER statement below.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) P(3), the Cartesian coordinates of the point P to
-!    be located relative to the triangulation.  It is assumed
-!    that P(1)**2 + P(2)**2 + P(3)**2 = 1, that is, that the
-!    point lies on the unit sphere.
-!
-!    Input, integer ( kind = 4 ) IST, the index of the node at which the search
-!    is to begin.  The search time depends on the proximity of this
-!    node to P.  If no good candidate is known, any value between
-!    1 and N will do.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    N must be at least 3.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the Cartesian coordinates of
-!    the nodes.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    the data structure defining the triangulation, created by TRMESH.
-!
-!    Output, real ( kind = 8 ) AL, the arc length between P and node NEARND.
-!    Because both points are on the unit sphere, this is also
-!    the angular separation in radians.
-!
-!    Output, integer ( kind = 4 ) NEARND, the index of the nearest node to P.
-!    NEARND will be 0 if N < 3 or the triangulation data structure
-!    is invalid.
-!
-!  Local parameters:
-!
-!    B1,B2,B3 =  Unnormalized barycentric coordinates returned by TRFIND
-!    DS1 =       (Negative cosine of the) distance from P to N1
-!    DSR =       (Negative cosine of the) distance from P to NR
-!    DX1,..DZ3 = Components of vectors used by the swap test
-!    I1,I2,I3 =  Nodal indexes of a triangle containing P, or
-!                the rightmost (I1) and leftmost (I2) visible
-!                boundary nodes as viewed from P
-!    L =         Length of LISTP/LPTRP and number of neighbors of P
-!    LMAX =      Maximum value of L
-!    LISTP =     Indexes of the neighbors of P
-!    LPTRP =     Array of pointers in 1-1 correspondence with LISTP elements
-!    LP =        LIST pointer to a neighbor of N1 and LISTP pointer
-!    LP1,LP2 =   LISTP indexes (pointers)
-!    LPL =       Pointer to the last neighbor of N1
-!    N1 =        Index of a node visible from P
-!    N2 =        Index of an endpoint of an arc opposite P
-!    N3 =        Index of the node opposite N1->N2
-!    NN =        Local copy of N
-!    NR =        Index of a candidate for the nearest node to P
-!    NST =       Index of the node at which TRFIND begins the search
-!
-  implicit none
-
-  integer ( kind = 4 ), parameter :: lmax = 25
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) al
-  real    ( kind = 8 ) b1
-  real    ( kind = 8 ) b2
-  real    ( kind = 8 ) b3
-  real    ( kind = 8 ) ds1
-  real    ( kind = 8 ) dsr
-  real    ( kind = 8 ) dx1
-  real    ( kind = 8 ) dx2
-  real    ( kind = 8 ) dx3
-  real    ( kind = 8 ) dy1
-  real    ( kind = 8 ) dy2
-  real    ( kind = 8 ) dy3
-  real    ( kind = 8 ) dz1
-  real    ( kind = 8 ) dz2
-  real    ( kind = 8 ) dz3
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ist
-  integer ( kind = 4 ) l
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) listp(lmax)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp1
-  integer ( kind = 4 ) lp2
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lptrp(lmax)
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) nearnd
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nr
-  integer ( kind = 4 ) nst
-  real    ( kind = 8 ) p(3)
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nearnd = 0
-  al = 0.0D+00
-!
-!  Store local parameters and test for N invalid.
-!
-  nn = n
-
-  if ( nn < 3 ) then
-    return
-  end if
-
-  nst = ist
-
-  if ( nst < 1 .or. nn < nst ) then
-    nst = 1
-  end if
-!
-!  Find a triangle (I1,I2,I3) containing P, or the rightmost
-!  (I1) and leftmost (I2) visible boundary nodes as viewed from P.
-!
-  call trfind ( nst, p, n, x, y, z, list, lptr, lend, b1, b2, b3, i1, i2, i3 )
-!
-!  Test for collinear nodes.
-!
-  if ( i1 == 0 ) then
-    return
-  end if
-!
-!  Store the linked list of 'neighbors' of P in LISTP and
-!  LPTRP.  I1 is the first neighbor, and 0 is stored as
-!  the last neighbor if P is not contained in a triangle.
-!  L is the length of LISTP and LPTRP, and is limited to
-!  LMAX.
-!
-  if ( i3 /= 0 ) then
-
-    listp(1) = i1
-    lptrp(1) = 2
-    listp(2) = i2
-    lptrp(2) = 3
-    listp(3) = i3
-    lptrp(3) = 1
-    l = 3
-
-  else
-
-    n1 = i1
-    l = 1
-    lp1 = 2
-    listp(l) = n1
-    lptrp(l) = lp1
-!
-!  Loop on the ordered sequence of visible boundary nodes
-!  N1 from I1 to I2.
-!
-    do
-
-      lpl = lend(n1)
-      n1 = -list(lpl)
-      l = lp1
-      lp1 = l+1
-      listp(l) = n1
-      lptrp(l) = lp1
-
-      if ( n1 == i2 .or. lmax <= lp1 ) then
-        exit
-      end if
-
-    end do
-
-    l = lp1
-    listp(l) = 0
-    lptrp(l) = 1
-
-  end if
-!
-!  Initialize variables for a loop on arcs N1-N2 opposite P
-!  in which new 'neighbors' are 'swapped' in.  N1 follows
-!  N2 as a neighbor of P, and LP1 and LP2 are the LISTP
-!  indexes of N1 and N2.
-!
-  lp2 = 1
-  n2 = i1
-  lp1 = lptrp(1)
-  n1 = listp(lp1)
-!
-!  Begin loop:  find the node N3 opposite N1->N2.
-!
-  do
-
-    lp = lstptr ( lend(n1), n2, list, lptr )
-
-    if ( 0 <= list(lp) ) then
-
-      lp = lptr(lp)
-      n3 = abs ( list(lp) )
-!
-!  Swap test:  Exit the loop if L = LMAX.
-!
-      if ( l == lmax ) then
-        exit
-      end if
-
-      dx1 = x(n1) - p(1)
-      dy1 = y(n1) - p(2)
-      dz1 = z(n1) - p(3)
-
-      dx2 = x(n2) - p(1)
-      dy2 = y(n2) - p(2)
-      dz2 = z(n2) - p(3)
-
-      dx3 = x(n3) - p(1)
-      dy3 = y(n3) - p(2)
-      dz3 = z(n3) - p(3)
-!
-!  Swap:  Insert N3 following N2 in the adjacency list for P.
-!  The two new arcs opposite P must be tested.
-!
-      if ( dx3 * ( dy2 * dz1 - dy1 * dz2 ) - &
-           dy3 * ( dx2 * dz1 - dx1 * dz2 ) + &
-           dz3 * ( dx2 * dy1 - dx1 * dy2 ) > 0.0D+00 ) then
-
-        l = l+1
-        lptrp(lp2) = l
-        listp(l) = n3
-        lptrp(l) = lp1
-        lp1 = l
-        n1 = n3
-        cycle
-
-      end if
-
-    end if
-!
-!  No swap:  Advance to the next arc and test for termination
-!  on N1 = I1 (LP1 = 1) or N1 followed by 0.
-!
-    if ( lp1 == 1 ) then
-      exit
-    end if
-
-    lp2 = lp1
-    n2 = n1
-    lp1 = lptrp(lp1)
-    n1 = listp(lp1)
-
-    if ( n1 == 0 ) then
-      exit
-    end if
-
-  end do
-!
-!  Set NR and DSR to the index of the nearest node to P and
-!  an increasing function (negative cosine) of its distance
-!  from P, respectively.
-!
-  nr = i1
-  dsr = -( x(nr) * p(1) + y(nr) * p(2) + z(nr) * p(3) )
-
-  do lp = 2, l
-
-    n1 = listp(lp)
-
-    if ( n1 == 0 ) then
-      cycle
-    end if
-
-    ds1 = -( x(n1) * p(1) + y(n1) * p(2) + z(n1) * p(3) )
-
-    if ( ds1 < dsr ) then
-      nr = n1
-      dsr = ds1
-    end if
-
-  end do
-
-  dsr = -dsr
-  dsr = min ( dsr, 1.0D+00 )
-
-  al = acos ( dsr )
-  nearnd = nr
-
-  return
-end
-subroutine optim ( x, y, z, na, list, lptr, lend, nit, iwk, ier )
-
-!*****************************************************************************80
-!
-!! OPTIM optimizes the quadrilateral portion of a triangulation.
-!
-!  Discussion:
-!
-!    Given a set of NA triangulation arcs, this subroutine
-!    optimizes the portion of the triangulation consisting of
-!    the quadrilaterals (pairs of adjacent triangles) which
-!    have the arcs as diagonals by applying the circumcircle
-!    test and appropriate swaps to the arcs.
-!
-!    An iteration consists of applying the swap test and
-!    swaps to all NA arcs in the order in which they are
-!    stored.  The iteration is repeated until no swap occurs
-!    or NIT iterations have been performed.  The bound on the
-!    number of iterations may be necessary to prevent an
-!    infinite loop caused by cycling (reversing the effect of a
-!    previous swap) due to floating point inaccuracy when four
-!    or more nodes are nearly cocircular.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X(*), Y(*), Z(*), the nodal coordinates.
-!
-!    Input, integer ( kind = 4 ) NA, the number of arcs in the set.  NA >= 0.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    the data structure defining the triangulation, created by TRMESH.
-!    On output, updated to reflect the swaps.
-!
-!    Input/output, integer ( kind = 4 ) NIT.  On input, the maximum number of
-!    iterations to be performed.  NIT = 4*NA should be sufficient.  NIT >= 1.
-!    On output, the number of iterations performed.
-!
-!    Input/output, integer ( kind = 4 ) IWK(2,NA), the nodal indexes of the arc
-!    endpoints (pairs of endpoints are stored in columns).  On output, endpoint
-!    indexes of the new set of arcs reflecting the swaps.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if a swap occurred on the last of MAXIT iterations, where MAXIT is the
-!      value of NIT on input.  The new set of arcs is not necessarily optimal
-!      in this case.
-!    2, if NA < 0 or NIT < 1 on input.
-!    3, if IWK(2,I) is not a neighbor of IWK(1,I) for some I in the range 1
-!      to NA.  A swap may have occurred in this case.
-!    4, if a zero pointer was returned by subroutine SWAP.
-!
-!  Local parameters:
-!
-!    I =       Column index for IWK
-!    IO1,IO2 = Nodal indexes of the endpoints of an arc in IWK
-!    ITER =    Iteration count
-!    LP =      LIST pointer
-!    LP21 =    Parameter returned by SWAP (not used)
-!    LPL =     Pointer to the last neighbor of IO1
-!    LPP =     Pointer to the node preceding IO2 as a neighbor of IO1
-!    MAXIT =   Input value of NIT
-!    N1,N2 =   Nodes opposite IO1->IO2 and IO2->IO1, respectively
-!    NNA =     Local copy of NA
-!    SWP =     Flag set to TRUE iff a swap occurs in the optimization loop
-!
-  implicit none
-
-  integer ( kind = 4 ) na
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) iter
-  integer ( kind = 4 ) iwk(2,na)
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpp
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) maxit
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) nit
-  integer ( kind = 4 ) nna
-  logical swp
-  logical swptst
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) z(*)
-
-  nna = na
-  maxit = nit
-
-  if ( nna < 0 .or. maxit < 1 ) then
-    nit = 0
-    ier = 2
-    return
-  end if
-!
-!  Initialize iteration count ITER and test for NA = 0.
-!
-  iter = 0
-
-  if ( nna == 0 ) then
-    nit = 0
-    ier = 0
-    return
-  end if
-!
-!  Top of loop.
-!  SWP = TRUE iff a swap occurred in the current iteration.
-!
-  do
-
-    if ( maxit <= iter ) then
-      nit = iter
-      ier = 1
-      return
-    end if
-
-    iter = iter + 1
-    swp = .false.
-!
-!  Inner loop on arcs IO1-IO2.
-!
-    do i = 1, nna
-
-      io1 = iwk(1,i)
-      io2 = iwk(2,i)
-!
-!  Set N1 and N2 to the nodes opposite IO1->IO2 and
-!  IO2->IO1, respectively.  Determine the following:
-!
-!  LPL = pointer to the last neighbor of IO1,
-!  LP = pointer to IO2 as a neighbor of IO1, and
-!  LPP = pointer to the node N2 preceding IO2.
-!
-      lpl = lend(io1)
-      lpp = lpl
-      lp = lptr(lpp)
-
-      do
-
-        if ( list(lp) == io2 ) then
-          go to 3
-        end if
-
-        lpp = lp
-        lp = lptr(lpp)
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-!
-!  IO2 should be the last neighbor of IO1.  Test for no
-!  arc and bypass the swap test if IO1 is a boundary node.
-!
-      if ( abs ( list(lp) ) /= io2 ) then
-        nit = iter
-        ier = 3
-        return
-      end if
-
-      if ( list(lp) < 0 ) then
-        go to 4
-      end if
-!
-!  Store N1 and N2, or bypass the swap test if IO1 is a
-!  boundary node and IO2 is its first neighbor.
-!
-3     continue
-
-      n2 = list(lpp)
-!
-!  Test IO1-IO2 for a swap, and update IWK if necessary.
-!
-      if ( 0 <= n2 ) then
-
-        lp = lptr(lp)
-        n1 = abs ( list(lp) )
-
-        if ( swptst ( n1, n2, io1, io2, x, y, z ) ) then
-
-          call swap ( n1, n2, io1, io2, list, lptr, lend, lp21 )
-
-          if ( lp21 == 0 ) then
-            nit = iter
-            ier = 4
-            return
-          end if
-
-          swp = .true.
-          iwk(1,i) = n1
-          iwk(2,i) = n2
-
-        end if
-
-      end if
-
-4     continue
-
-    end do
-
-    if ( .not. swp ) then
-      exit
-    end if
-
-  end do
-
-  nit = iter
-  ier = 0
-
-  return
-end
-subroutine r83vec_normalize ( n, x, y, z )
-
-!*****************************************************************************80
-!
-!! R83VEC_NORMALIZE normalizes each R83 in an R83VEC to have unit norm.
-!
-!  Modified:
-!
-!    25 June 2002
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of vectors.
-!
-!    Input/output, real ( kind = 8 ) X(N), Y(N), Z(N), the components of
-!    the vectors.
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  real    ( kind = 8 ) norm
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  do i = 1, n
-
-    norm = sqrt ( x(i)**2 + y(i)**2 + z(i)**2 )
-
-    if ( norm /= 0.0D+00 ) then
-      x(i) = x(i) / norm
-      y(i) = y(i) / norm
-      z(i) = z(i) / norm
-    end if
-
-  end do
-
-  return
-end
-subroutine scoord ( px, py, pz, plat, plon, pnrm )
-
-!*****************************************************************************80
-!
-!! SCOORD converts from Cartesian to spherical coordinates.
-!
-!  Discussion:
-!
-!    This subroutine converts a point P from Cartesian (X,Y,Z) coordinates
-!    to spherical ( LATITUDE, LONGITUDE, RADIUS ) coordinates.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) PX, PY, PZ, the coordinates of P.
-!
-!    Output, real ( kind = 8 ) PLAT, the latitude of P in the range -PI/2
-!    to PI/2, or 0 if PNRM = 0.
-!
-!    Output, real ( kind = 8 ) PLON, the longitude of P in the range -PI to PI,
-!    or 0 if P lies on the Z-axis.
-!
-!    Output, real ( kind = 8 ) PNRM, the magnitude (Euclidean norm) of P.
-!
-  implicit none
-
-  real    ( kind = 8 ) plat
-  real    ( kind = 8 ) plon
-  real    ( kind = 8 ) pnrm
-  real    ( kind = 8 ) px
-  real    ( kind = 8 ) py
-  real    ( kind = 8 ) pz
-
-  pnrm = sqrt ( px * px + py * py + pz * pz )
-
-  if ( px /= 0.0D+00 .or. py /= 0.0D+00 ) then
-    plon = atan2 ( py, px )
-  else
-    plon = 0.0D+00
-  end if
-
-  if ( pnrm /= 0.0D+00 ) then
-    plat = asin ( pz / pnrm )
-  else
-    plat = 0.0D+00
-  end if
-
-  return
-end
-function store ( x )
-
-!*****************************************************************************80
-!
-!! STORE forces its argument to be stored.
-!
-!  Discussion:
-!
-!    This function forces its argument X to be stored in a
-!    memory location, thus providing a means of determining
-!    floating point number characteristics (such as the machine
-!    precision) when it is necessary to avoid computation in
-!    high precision registers.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, real ( kind = 8 ) X, the value to be stored.
-!
-!    Output, real ( kind = 8 ) STORE, the value of X after it has been stored
-!    and possibly truncated or rounded to the single precision word length.
-!
-  implicit none
-
-  real    ( kind = 8 ) store
-  real    ( kind = 8 ) x
-  real    ( kind = 8 ) y
-
-  common /stcom/ y
-
-  y = x
-  store = y
-
-  return
-end
-subroutine swap ( in1, in2, io1, io2, list, lptr, lend, lp21 )
-
-!*****************************************************************************80
-!
-!! SWAP replaces the diagonal arc of a quadrilateral with the other diagonal.
-!
-!  Discussion:
-!
-!    Given a triangulation of a set of points on the unit
-!    sphere, this subroutine replaces a diagonal arc in a
-!    strictly convex quadrilateral (defined by a pair of adja-
-!    cent triangles) with the other diagonal.  Equivalently, a
-!    pair of adjacent triangles is replaced by another pair
-!    having the same union.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) IN1, IN2, IO1, IO2, nodal indexes of the
-!    vertices of the quadrilateral.  IO1-IO2 is replaced by IN1-IN2.
-!    (IO1,IO2,IN1) and (IO2,IO1,IN2) must be triangles on input.
-!
-!    Input/output, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N),
-!    the data structure defining the triangulation, created by TRMESH.
-!    On output, updated with the swap; triangles (IO1,IO2,IN1) an (IO2,IO1,IN2)
-!    are replaced by (IN1,IN2,IO2) and (IN2,IN1,IO1) unless LP21 = 0.
-!
-!    Output, integer ( kind = 4 ) LP21, index of IN1 as a neighbor of IN2 after
-!    the swap is performed unless IN1 and IN2 are adjacent on input, in which
-!    case LP21 = 0.
-!
-!  Local parameters:
-!
-!    LP, LPH, LPSAV = LIST pointers
-!
-  implicit none
-
-  integer ( kind = 4 ) in1
-  integer ( kind = 4 ) in2
-  integer ( kind = 4 ) io1
-  integer ( kind = 4 ) io2
-  integer ( kind = 4 ) lend(*)
-  integer ( kind = 4 ) list(*)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp21
-  integer ( kind = 4 ) lph
-  integer ( kind = 4 ) lpsav
-  integer ( kind = 4 ) lptr(*)
-  integer ( kind = 4 ) lstptr
-!
-!  Test for IN1 and IN2 adjacent.
-!
-  lp = lstptr ( lend(in1), in2, list, lptr )
-
-  if ( abs ( list(lp) ) == in2 ) then
-    lp21 = 0
-    return
-  end if
-!
-!  Delete IO2 as a neighbor of IO1.
-!
-  lp = lstptr ( lend(io1), in2, list, lptr )
-  lph = lptr(lp)
-  lptr(lp) = lptr(lph)
-!
-!  If IO2 is the last neighbor of IO1, make IN2 the last neighbor.
-!
-  if ( lend(io1) == lph ) then
-    lend(io1) = lp
-  end if
-!
-!  Insert IN2 as a neighbor of IN1 following IO1 using the hole created above.
-!
-  lp = lstptr ( lend(in1), io1, list, lptr )
-  lpsav = lptr(lp)
-  lptr(lp) = lph
-  list(lph) = in2
-  lptr(lph) = lpsav
-!
-!  Delete IO1 as a neighbor of IO2.
-!
-  lp = lstptr ( lend(io2), in1, list, lptr )
-  lph = lptr(lp)
-  lptr(lp) = lptr(lph)
-!
-!  If IO1 is the last neighbor of IO2, make IN1 the last neighbor.
-!
-  if ( lend(io2) == lph ) then
-    lend(io2) = lp
-  end if
-!
-!  Insert IN1 as a neighbor of IN2 following IO2.
-!
-  lp = lstptr ( lend(in2), io2, list, lptr )
-  lpsav = lptr(lp)
-  lptr(lp) = lph
-  list(lph) = in1
-  lptr(lph) = lpsav
-  lp21 = lph
-
-  return
-end
-function swptst ( n1, n2, n3, n4, x, y, z )
-
-!*****************************************************************************80
-!
-!! SWPTST decides whether to replace a diagonal arc by the other.
-!
-!  Discussion:
-!
-!    This function decides whether or not to replace a
-!    diagonal arc in a quadrilateral with the other diagonal.
-!    The decision will be to swap (SWPTST = TRUE) if and only
-!    if N4 lies above the plane (in the half-space not contain-
-!    ing the origin) defined by (N1,N2,N3), or equivalently, if
-!    the projection of N4 onto this plane is interior to the
-!    circumcircle of (N1,N2,N3).  The decision will be for no
-!    swap if the quadrilateral is not strictly convex.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N1, N2, N3, N4, indexes of the four nodes
-!    defining the quadrilateral with N1 adjacent to N2, and (N1,N2,N3) in
-!    counterclockwise order.  The arc connecting N1 to N2 should be replaced
-!    by an arc connecting N3 to N4 if SWPTST = TRUE.  Refer to subroutine SWAP.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes.
-!
-!    Output, logical SWPTST, TRUE if and only if the arc connecting N1
-!    and N2 should be swapped for an arc connecting N3 and N4.
-!
-!  Local parameters:
-!
-!    DX1,DY1,DZ1 = Coordinates of N4->N1
-!    DX2,DY2,DZ2 = Coordinates of N4->N2
-!    DX3,DY3,DZ3 = Coordinates of N4->N3
-!    X4,Y4,Z4 =    Coordinates of N4
-!
-  implicit none
-
-  real    ( kind = 8 ) dx1
-  real    ( kind = 8 ) dx2
-  real    ( kind = 8 ) dx3
-  real    ( kind = 8 ) dy1
-  real    ( kind = 8 ) dy2
-  real    ( kind = 8 ) dy3
-  real    ( kind = 8 ) dz1
-  real    ( kind = 8 ) dz2
-  real    ( kind = 8 ) dz3
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) n4
-  logical swptst
-  real    ( kind = 8 ) x(*)
-  real    ( kind = 8 ) x4
-  real    ( kind = 8 ) y(*)
-  real    ( kind = 8 ) y4
-  real    ( kind = 8 ) z(*)
-  real    ( kind = 8 ) z4
-
-  x4 = x(n4)
-  y4 = y(n4)
-  z4 = z(n4)
-  dx1 = x(n1) - x4
-  dx2 = x(n2) - x4
-  dx3 = x(n3) - x4
-  dy1 = y(n1) - y4
-  dy2 = y(n2) - y4
-  dy3 = y(n3) - y4
-  dz1 = z(n1) - z4
-  dz2 = z(n2) - z4
-  dz3 = z(n3) - z4
-!
-!  N4 lies above the plane of (N1,N2,N3) iff N3 lies above
-!  the plane of (N2,N1,N4) iff Det(N3-N4,N2-N4,N1-N4) =
-!  (N3-N4,N2-N4 X N1-N4) > 0.
-!
-  swptst =  dx3 * ( dy2 * dz1 - dy1 * dz2 ) &
-          - dy3 * ( dx2 * dz1 - dx1 * dz2 ) &
-          + dz3 * ( dx2 * dy1 - dx1 * dy2 ) > 0.0D+00
-
-  return
-end
-subroutine timestamp ( )
-
-!*****************************************************************************80
-!
-!! TIMESTAMP prints the current YMDHMS date as a time stamp.
-!
-!  Example:
-!
-!    May 31 2001   9:45:54.872 AM
-!
-!  Modified:
-!
-!    26 February 2005
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    None
-!
-  implicit none
-
-  character ( len = 8 ) ampm
-  integer ( kind = 4 ) d
-  integer ( kind = 4 ) h
-  integer ( kind = 4 ) m
-  integer ( kind = 4 ) mm
-  character ( len = 9 ), parameter, dimension(12) :: month = (/ &
-    'January  ', 'February ', 'March    ', 'April    ', &
-    'May      ', 'June     ', 'July     ', 'August   ', &
-    'September', 'October  ', 'November ', 'December ' /)
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) s
-  integer ( kind = 4 ) values(8)
-  integer ( kind = 4 ) y
-
-  call date_and_time ( values = values )
-
-  y = values(1)
-  m = values(2)
-  d = values(3)
-  h = values(5)
-  n = values(6)
-  s = values(7)
-  mm = values(8)
-
-  if ( h < 12 ) then
-    ampm = 'AM'
-  else if ( h == 12 ) then
-    if ( n == 0 .and. s == 0 ) then
-      ampm = 'Noon'
-    else
-      ampm = 'PM'
-    end if
-  else
-    h = h - 12
-    if ( h < 12 ) then
-      ampm = 'PM'
-    else if ( h == 12 ) then
-      if ( n == 0 .and. s == 0 ) then
-        ampm = 'Midnight'
-      else
-        ampm = 'AM'
-      end if
-    end if
-  end if
-
-  write ( *, '(a,1x,i2,1x,i4,2x,i2,a1,i2.2,a1,i2.2,a1,i3.3,1x,a)' ) &
-    trim ( month(m) ), d, y, h, ':', n, ':', s, '.', mm, trim ( ampm )
-
-  return
-end
-subroutine trans ( n, rlat, rlon, x, y, z )
-
-!*****************************************************************************80
-!
-!! TRANS transforms spherical coordinates to Cartesian coordinates.
-!
-!  Discussion:
-!
-!    This subroutine transforms spherical coordinates into
-!    Cartesian coordinates on the unit sphere for input to
-!    TRMESH.  Storage for X and Y may coincide with
-!    storage for RLAT and RLON if the latter need not be saved.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes (points on the unit
-!    sphere) whose coordinates are to be transformed.
-!
-!    Input, real ( kind = 8 ) RLAT(N), latitudes of the nodes in radians.
-!
-!    Input, real ( kind = 8 ) RLON(N), longitudes of the nodes in radians.
-!
-!    Output, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates in the
-!    range -1 to 1.  X(I)**2 + Y(I)**2 + Z(I)**2 = 1 for I = 1 to N.
-!
-!  Local parameters:
-!
-!    COSPHI = cos(PHI)
-!    I =      DO-loop index
-!    NN =     Local copy of N
-!    PHI =    Latitude
-!    THETA =  Longitude
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) cosphi
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) nn
-  real    ( kind = 8 ) phi
-  real    ( kind = 8 ) rlat(n)
-  real    ( kind = 8 ) rlon(n)
-  real    ( kind = 8 ) theta
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nn = n
-
-  do i = 1, nn
-    phi = rlat(i)
-    theta = rlon(i)
-    cosphi = cos ( phi )
-    x(i) = cosphi * cos ( theta )
-    y(i) = cosphi * sin ( theta )
-    z(i) = sin ( phi )
-  end do
-
-  return
-end
-subroutine trfind ( nst, p, n, x, y, z, list, lptr, lend, b1, b2, b3, i1, &
-  i2, i3 )
-
-!*****************************************************************************80
-!
-!! TRFIND locates a point relative to a triangulation.
-!
-!  Discussion:
-!
-!    This subroutine locates a point P relative to a triangulation
-!    created by TRMESH.  If P is contained in
-!    a triangle, the three vertex indexes and barycentric
-!    coordinates are returned.  Otherwise, the indexes of the
-!    visible boundary nodes are returned.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) NST, index of a node at which TRFIND begins
-!    its search.  Search time depends on the proximity of this node to P.
-!
-!    Input, real ( kind = 8 ) P(3), the x, y, and z coordinates (in that order)
-!    of the point P to be located.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the
-!    triangulation nodes (unit vectors).
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the
-!    data structure defining the triangulation, created by TRMESH.
-!
-!    Output, real ( kind = 8 ) B1, B2, B3, the unnormalized barycentric
-!    coordinates of the central projection of P onto the underlying planar
-!    triangle if P is in the convex hull of the nodes.  These parameters
-!    are not altered if I1 = 0.
-!
-!    Output, integer ( kind = 4 ) I1, I2, I3, the counterclockwise-ordered
-!    vertex indexes of a triangle containing P if P is contained in a triangle.
-!    If P is not in the convex hull of the nodes, I1 and I2 are the rightmost
-!    and leftmost (boundary) nodes that are visible from P, and I3 = 0.  (If
-!    all boundary nodes are visible from P, then I1 and I2 coincide.)
-!    I1 = I2 = I3 = 0 if P and all of the nodes are coplanar (lie on a
-!    common great circle.
-!
-!  Local parameters:
-!
-!    EPS =      Machine precision
-!    IX,IY,IZ = Integer seeds for JRAND
-!    LP =       LIST pointer
-!    N0,N1,N2 = Nodes in counterclockwise order defining a
-!               cone (with vertex N0) containing P, or end-
-!               points of a boundary edge such that P Right
-!               N1->N2
-!    N1S,N2S =  Initially-determined values of N1 and N2
-!    N3,N4 =    Nodes opposite N1->N2 and N2->N1, respectively
-!    NEXT =     Candidate for I1 or I2 when P is exterior
-!    NF,NL =    First and last neighbors of N0, or first
-!               (rightmost) and last (leftmost) nodes
-!               visible from P when P is exterior to the
-!               triangulation
-!    PTN1 =     Scalar product <P,N1>
-!    PTN2 =     Scalar product <P,N2>
-!    Q =        (N2 X N1) X N2  or  N1 X (N2 X N1) -- used in
-!               the boundary traversal when P is exterior
-!    S12 =      Scalar product <N1,N2>
-!    TOL =      Tolerance (multiple of EPS) defining an upper
-!               bound on the magnitude of a negative bary-
-!               centric coordinate (B1 or B2) for P in a
-!               triangle -- used to avoid an infinite number
-!               of restarts with 0 <= B3 < EPS and B1 < 0 or
-!               B2 < 0 but small in magnitude
-!    XP,YP,ZP = Local variables containing P(1), P(2), and P(3)
-!    X0,Y0,Z0 = Dummy arguments for DET
-!    X1,Y1,Z1 = Dummy arguments for DET
-!    X2,Y2,Z2 = Dummy arguments for DET
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) b1
-  real    ( kind = 8 ) b2
-  real    ( kind = 8 ) b3
-  real    ( kind = 8 ) det
-  real    ( kind = 8 ) eps
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ), save :: ix = 1
-  integer ( kind = 4 ), save :: iy = 2
-  integer ( kind = 4 ), save :: iz = 3
-  integer ( kind = 4 ) jrand
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lstptr
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n1s
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n2s
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) n4
-  integer ( kind = 4 ) next
-  integer ( kind = 4 ) nf
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ) nst
-  real    ( kind = 8 ) p(3)
-  real    ( kind = 8 ) ptn1
-  real    ( kind = 8 ) ptn2
-  real    ( kind = 8 ) q(3)
-  real    ( kind = 8 ) s12
-  real    ( kind = 8 ) store
-  real    ( kind = 8 ) tol
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) xp
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) yp
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-  real    ( kind = 8 ) zp
-!
-!  Statement function:
-!
-!  DET(X1,...,Z0) >= 0 if and only if (X0,Y0,Z0) is in the
-!  (closed) left hemisphere defined by the plane containing (0,0,0),
-!  (X1,Y1,Z1), and (X2,Y2,Z2), where left is defined relative to an
-!  observer at (X1,Y1,Z1) facing (X2,Y2,Z2).
-!
-  det (x1,y1,z1,x2,y2,z2,x0,y0,z0) = x0*(y1*z2-y2*z1) &
-       - y0*(x1*z2-x2*z1) + z0*(x1*y2-x2*y1)
-!
-!  Initialize variables.
-!
-  xp = p(1)
-  yp = p(2)
-  zp = p(3)
-  n0 = nst
-
-  if ( n0 < 1 .or. n < n0 ) then
-    n0 = jrand ( n, ix, iy, iz )
-  end if
-!
-!  Compute the relative machine precision EPS and TOL.
-!
-  eps = epsilon ( eps )
-  tol = 100.0D+00 * eps
-!
-!  Set NF and NL to the first and last neighbors of N0, and initialize N1 = NF.
-!
-2 continue
-
-  lp = lend(n0)
-  nl = list(lp)
-  lp = lptr(lp)
-  nf = list(lp)
-  n1 = nf
-!
-!  Find a pair of adjacent neighbors N1,N2 of N0 that define
-!  a wedge containing P:  P LEFT N0->N1 and P RIGHT N0->N2.
-!
-  if ( 0 < nl ) then
-!
-!  N0 is an interior node.  Find N1.
-!
-3   continue
-
-    if ( det ( x(n0),y(n0),z(n0),x(n1),y(n1),z(n1),xp,yp,zp ) < 0.0D+00 ) then
-      lp = lptr(lp)
-      n1 = list(lp)
-      if ( n1 == nl ) then
-        go to 6
-      end if
-      go to 3
-    end if
-
-  else
-!
-!  N0 is a boundary node.  Test for P exterior.
-!
-    nl = -nl
-!
-!  Is P to the right of the boundary edge N0->NF?
-!
-    if ( det(x(n0),y(n0),z(n0),x(nf),y(nf),z(nf), xp,yp,zp) < 0.0D+00 ) then
-      n1 = n0
-      n2 = nf
-      go to 9
-    end if
-!
-!  Is P to the right of the boundary edge NL->N0?
-!
-    if ( det(x(nl),y(nl),z(nl),x(n0),y(n0),z(n0),xp,yp,zp) < 0.0D+00 ) then
-      n1 = nl
-      n2 = n0
-      go to 9
-    end if
-
-  end if
-!
-!  P is to the left of arcs N0->N1 and NL->N0.  Set N2 to the
-!  next neighbor of N0 (following N1).
-!
-4 continue
-
-    lp = lptr(lp)
-    n2 = abs ( list(lp) )
-
-    if ( det(x(n0),y(n0),z(n0),x(n2),y(n2),z(n2),xp,yp,zp) < 0.0D+00 ) then
-      go to 7
-    end if
-
-    n1 = n2
-
-    if ( n1 /= nl ) then
-      go to 4
-    end if
-
-  if ( det ( x(n0), y(n0), z(n0), x(nf), y(nf), z(nf), xp, yp, zp ) &
-    < 0.0D+00 ) then
-    go to 6
-  end if
-!
-!  P is left of or on arcs N0->NB for all neighbors NB
-!  of N0.  Test for P = +/-N0.
-!
-  if ( store ( abs ( x(n0 ) * xp + y(n0) * yp + z(n0) * zp) ) &
-    < 1.0D+00 - 4.0D+00 * eps ) then
-!
-!  All points are collinear iff P Left NB->N0 for all
-!  neighbors NB of N0.  Search the neighbors of N0.
-!  Note:  N1 = NL and LP points to NL.
-!
-    do
-      if ( det(x(n1),y(n1),z(n1),x(n0),y(n0),z(n0),xp,yp,zp) < 0.0D+00 ) then
-        exit
-      end if
-
-      lp = lptr(lp)
-      n1 = abs ( list(lp) )
-
-      if ( n1 == nl ) then
-        i1 = 0
-        i2 = 0
-        i3 = 0
-        return
-      end if
-
-    end do
-
-  end if
-!
-!  P is to the right of N1->N0, or P = +/-N0.  Set N0 to N1 and start over.
-!
-  n0 = n1
-  go to 2
-!
-!  P is between arcs N0->N1 and N0->NF.
-!
-6 continue
-
-  n2 = nf
-!
-!  P is contained in a wedge defined by geodesics N0-N1 and
-!  N0-N2, where N1 is adjacent to N2.  Save N1 and N2 to
-!  test for cycling.
-!
-7 continue
-
-  n3 = n0
-  n1s = n1
-  n2s = n2
-!
-!  Top of edge-hopping loop:
-!
-8 continue
-
-  b3 = det ( x(n1),y(n1),z(n1),x(n2),y(n2),z(n2),xp,yp,zp )
-
-  if ( b3 < 0.0D+00 ) then
-!
-!  Set N4 to the first neighbor of N2 following N1 (the
-!  node opposite N2->N1) unless N1->N2 is a boundary arc.
-!
-    lp = lstptr ( lend(n2), n1, list, lptr )
-
-    if ( list(lp) < 0 ) then
-      go to 9
-    end if
-
-    lp = lptr(lp)
-    n4 = abs ( list(lp) )
-!
-!  Define a new arc N1->N2 which intersects the geodesic N0-P.
-!
-    if ( det ( x(n0),y(n0),z(n0),x(n4),y(n4),z(n4),xp,yp,zp ) < 0.0D+00 ) then
-      n3 = n2
-      n2 = n4
-      n1s = n1
-      if ( n2 /= n2s .and. n2 /= n0 ) then
-        go to 8
-      end if
-    else
-      n3 = n1
-      n1 = n4
-      n2s = n2
-      if ( n1 /= n1s .and. n1 /= n0 ) then
-        go to 8
-      end if
-    end if
-!
-!  The starting node N0 or edge N1-N2 was encountered
-!  again, implying a cycle (infinite loop).  Restart
-!  with N0 randomly selected.
-!
-    n0 = jrand ( n, ix, iy, iz )
-    go to 2
-
-  end if
-!
-!  P is in (N1,N2,N3) unless N0, N1, N2, and P are collinear
-!  or P is close to -N0.
-!
-  if ( b3 >= eps ) then
-!
-!  B3 /= 0.
-!
-    b1 = det(x(n2),y(n2),z(n2),x(n3),y(n3),z(n3),xp,yp,zp)
-    b2 = det(x(n3),y(n3),z(n3),x(n1),y(n1),z(n1),xp,yp,zp)
-!
-!  Restart with N0 randomly selected.
-!
-    if ( b1 < -tol .or. b2 < -tol ) then
-      n0 = jrand ( n, ix, iy, iz )
-      go to 2
-    end if
-
-  else
-!
-!  B3 = 0 and thus P lies on N1->N2. Compute
-!  B1 = Det(P,N2 X N1,N2) and B2 = Det(P,N1,N2 X N1).
-!
-    b3 = 0.0D+00
-    s12 = x(n1) * x(n2) + y(n1) * y(n2) + z(n1) * z(n2)
-    ptn1 = xp * x(n1) + yp * y(n1) + zp * z(n1)
-    ptn2 = xp * x(n2) + yp * y(n2) + zp * z(n2)
-    b1 = ptn1 - s12 * ptn2
-    b2 = ptn2 - s12 * ptn1
-!
-!  Restart with N0 randomly selected.
-!
-    if ( b1 < -tol .or. b2 < -tol ) then
-      n0 = jrand ( n, ix, iy, iz )
-      go to 2
-    end if
-
-  end if
-!
-!  P is in (N1,N2,N3).
-!
-  i1 = n1
-  i2 = n2
-  i3 = n3
-  b1 = max ( b1, 0.0D+00 )
-  b2 = max ( b2, 0.0D+00 )
-  return
-!
-!  P Right N1->N2, where N1->N2 is a boundary edge.
-!  Save N1 and N2, and set NL = 0 to indicate that
-!  NL has not yet been found.
-!
-9 continue
-
-  n1s = n1
-  n2s = n2
-  nl = 0
-!
-!  Counterclockwise Boundary Traversal:
-!
-10 continue
-
-  lp = lend(n2)
-  lp = lptr(lp)
-  next = list(lp)
-
-  if ( det(x(n2),y(n2),z(n2),x(next),y(next),z(next),xp,yp,zp) >= 0.0D+00 ) then
-!
-!  N2 is the rightmost visible node if P Forward N2->N1
-!  or NEXT Forward N2->N1.  Set Q to (N2 X N1) X N2.
-!
-    s12 = x(n1) * x(n2) + y(n1) * y(n2) + z(n1) * z(n2)
-
-    q(1) = x(n1) - s12 * x(n2)
-    q(2) = y(n1) - s12 * y(n2)
-    q(3) = z(n1) - s12 * z(n2)
-
-    if ( xp * q(1) + yp * q(2) + zp * q(3) >= 0.0D+00 ) then
-      go to 11
-    end if
-
-    if ( x(next) * q(1) + y(next) * q(2) + z(next) * q(3) >= 0.0D+00 ) then
-      go to 11
-    end if
-!
-!  N1, N2, NEXT, and P are nearly collinear, and N2 is
-!  the leftmost visible node.
-!
-    nl = n2
-  end if
-!
-!  Bottom of counterclockwise loop:
-!
-  n1 = n2
-  n2 = next
-
-  if ( n2 /= n1s ) then
-    go to 10
-  end if
-!
-!  All boundary nodes are visible from P.
-!
-  i1 = n1s
-  i2 = n1s
-  i3 = 0
-  return
-!
-!  N2 is the rightmost visible node.
-!
-11 continue
-
-  nf = n2
-
-  if ( nl == 0 ) then
-!
-!  Restore initial values of N1 and N2, and begin the search
-!  for the leftmost visible node.
-!
-    n2 = n2s
-    n1 = n1s
-!
-!  Clockwise Boundary Traversal:
-!
-12  continue
-
-    lp = lend(n1)
-    next = -list(lp)
-
-    if ( det(x(next),y(next),z(next),x(n1),y(n1),z(n1),xp,yp,zp) >= 0.0D+00 ) then
-!
-!  N1 is the leftmost visible node if P or NEXT is
-!  forward of N1->N2.  Compute Q = N1 X (N2 X N1).
-!
-      s12 = x(n1) * x(n2) + y(n1) * y(n2) + z(n1) * z(n2)
-      q(1) = x(n2) - s12 * x(n1)
-      q(2) = y(n2) - s12 * y(n1)
-      q(3) = z(n2) - s12 * z(n1)
-
-      if ( xp * q(1) + yp * q(2) + zp * q(3) >= 0.0D+00 ) then
-        go to 13
-      end if
-
-      if ( x(next) * q(1) + y(next) * q(2) + z(next) * q(3) >= 0.0D+00 ) then
-        go to 13
-      end if
-!
-!  P, NEXT, N1, and N2 are nearly collinear and N1 is the rightmost
-!  visible node.
-!
-      nf = n1
-    end if
-!
-!  Bottom of clockwise loop:
-!
-    n2 = n1
-    n1 = next
-
-    if ( n1 /= n1s ) then
-      go to 12
-    end if
-!
-!  All boundary nodes are visible from P.
-!
-    i1 = n1
-    i2 = n1
-    i3 = 0
-    return
-!
-!  N1 is the leftmost visible node.
-!
-13   continue
-
-    nl = n1
-
-  end if
-!
-!  NF and NL have been found.
-!
-  i1 = nf
-  i2 = nl
-  i3 = 0
-
-  return
-end
-subroutine trlist ( n, list, lptr, lend, nrow, nt, ltri, ier )
-
-!*****************************************************************************80
-!
-!! TRLIST converts a triangulation data structure to a triangle list.
-!
-!  Discussion:
-!
-!    This subroutine converts a triangulation data structure
-!    from the linked list created by TRMESH to a triangle list.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), linked
-!    list data structure defining the triangulation.  Refer to TRMESH.
-!
-!    Input, integer ( kind = 4 ) NROW, the number of rows (entries per triangle)
-!    reserved for the triangle list LTRI.  The value must be 6 if only the
-!    vertex indexes and neighboring triangle indexes are to be stored, or 9
-!    if arc indexes are also to be assigned and stored.  Refer to LTRI.
-!
-!    Output, integer ( kind = 4 ) NT, the number of triangles in the
-!    triangulation unless IER /=0, in which case NT = 0.  NT = 2N-NB-2 if
-!    NB >= 3 or 2N-4 if NB = 0, where NB is the number of boundary nodes.
-!
-!    Output, integer ( kind = 4 ) LTRI(NROW,*).  The second dimension of LTRI
-!    must be at least NT, where NT will be at most 2*N-4.  The J-th column
-!    contains the vertex nodal indexes (first three rows), neighboring triangle
-!    indexes (second three rows), and, if NROW = 9, arc indexes (last three
-!    rows) associated with triangle J for J = 1,...,NT.  The vertices are
-!    ordered counterclockwise with the first vertex taken to be the one
-!    with smallest index.  Thus, LTRI(2,J) and LTRI(3,J) are larger than
-!    LTRI(1,J) and index adjacent neighbors of node LTRI(1,J).  For
-!    I = 1,2,3, LTRI(I+3,J) and LTRI(I+6,J) index the triangle and arc,
-!    respectively, which are opposite (not shared by) node LTRI(I,J), with
-!    LTRI(I+3,J) = 0 if LTRI(I+6,J) indexes a boundary arc.  Vertex indexes
-!    range from 1 to N, triangle indexes from 0 to NT, and, if included,
-!    arc indexes from 1 to NA, where NA = 3N-NB-3 if NB >= 3 or 3N-6 if
-!    NB = 0.  The triangles are ordered on first (smallest) vertex indexes.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator.
-!    0, if no errors were encountered.
-!    1, if N or NROW is outside its valid range on input.
-!    2, if the triangulation data structure (LIST,LPTR,LEND) is invalid.
-!      Note, however, that these arrays are not completely tested for validity.
-!
-!  Local parameters:
-!
-!    ARCS =     Logical variable with value TRUE iff are
-!               indexes are to be stored
-!    I,J =      LTRI row indexes (1 to 3) associated with
-!               triangles KT and KN, respectively
-!    I1,I2,I3 = Nodal indexes of triangle KN
-!    ISV =      Variable used to permute indexes I1,I2,I3
-!    KA =       Arc index and number of currently stored arcs
-!    KN =       Index of the triangle that shares arc I1-I2 with KT
-!    KT =       Triangle index and number of currently stored triangles
-!    LP =       LIST pointer
-!    LP2 =      Pointer to N2 as a neighbor of N1
-!    LPL =      Pointer to the last neighbor of I1
-!    LPLN1 =    Pointer to the last neighbor of N1
-!    N1,N2,N3 = Nodal indexes of triangle KT
-!    NM2 =      N-2
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) nrow
-
-  logical arcs
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) isv
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) ka
-  integer ( kind = 4 ) kn
-  integer ( kind = 4 ) kt
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp2
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpln1
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) ltri(nrow,*)
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) nm2
-  integer ( kind = 4 ) nt
-!
-!  Test for invalid input parameters.
-!
-  if ( n < 3 .or. ( nrow /= 6 .and. nrow /= 9 ) ) then
-    nt = 0
-    ier = 1
-    return
-  end if
-!
-!  Initialize parameters for loop on triangles KT = (N1,N2,
-!  N3), where N1 < N2 and N1 < N3.
-!
-!  ARCS = TRUE iff arc indexes are to be stored.
-!  KA,KT = Numbers of currently stored arcs and triangles.
-!  NM2 = Upper bound on candidates for N1.
-!
-  arcs = nrow == 9
-  ka = 0
-  kt = 0
-  nm2 = n-2
-!
-!  Loop on nodes N1.
-!
-  do n1 = 1, nm2
-!
-!  Loop on pairs of adjacent neighbors (N2,N3).  LPLN1 points
-!  to the last neighbor of N1, and LP2 points to N2.
-!
-    lpln1 = lend(n1)
-    lp2 = lpln1
-
-1   continue
-
-      lp2 = lptr(lp2)
-      n2 = list(lp2)
-      lp = lptr(lp2)
-      n3 = abs ( list(lp) )
-
-      if ( n2 < n1 .or. n3 < n1 ) then
-        go to 8
-      end if
-!
-!  Add a new triangle KT = (N1,N2,N3).
-!
-      kt = kt + 1
-      ltri(1,kt) = n1
-      ltri(2,kt) = n2
-      ltri(3,kt) = n3
-!
-!  Loop on triangle sides (I2,I1) with neighboring triangles
-!  KN = (I1,I2,I3).
-!
-      do i = 1, 3
-
-        if ( i == 1 ) then
-          i1 = n3
-          i2 = n2
-        else if ( i == 2 ) then
-          i1 = n1
-          i2 = n3
-        else
-          i1 = n2
-          i2 = n1
-        end if
-!
-!  Set I3 to the neighbor of I1 that follows I2 unless
-!  I2->I1 is a boundary arc.
-!
-        lpl = lend(i1)
-        lp = lptr(lpl)
-
-        do
-
-          if ( list(lp) == i2 ) then
-            go to 3
-          end if
-
-          lp = lptr(lp)
-
-          if ( lp == lpl ) then
-            exit
-          end if
-
-        end do
-!
-!  Invalid triangulation data structure:  I1 is a neighbor of
-!  I2, but I2 is not a neighbor of I1.
-!
-        if ( abs ( list(lp) ) /= i2 ) then
-          nt = 0
-          ier = 2
-          return
-        end if
-!
-!  I2 is the last neighbor of I1.  Bypass the search for a neighboring
-!  triangle if I2->I1 is a boundary arc.
-!
-        kn = 0
-
-        if ( list(lp) < 0 ) then
-          go to 6
-        end if
-!
-!  I2->I1 is not a boundary arc, and LP points to I2 as
-!  a neighbor of I1.
-!
-3       continue
-
-        lp = lptr(lp)
-        i3 = abs ( list(lp) )
-!
-!  Find J such that LTRI(J,KN) = I3 (not used if KT < KN),
-!  and permute the vertex indexes of KN so that I1 is smallest.
-!
-        if ( i1 < i2 .and. i1 < i3 ) then
-          j = 3
-        else if ( i2 < i3 ) then
-          j = 2
-          isv = i1
-          i1 = i2
-          i2 = i3
-          i3 = isv
-        else
-          j = 1
-          isv = i1
-          i1 = i3
-          i3 = i2
-          i2 = isv
-        end if
-!
-!  Test for KT < KN (triangle index not yet assigned).
-!
-        if ( n1 < i1 ) then
-          cycle
-        end if
-!
-!  Find KN, if it exists, by searching the triangle list in
-!  reverse order.
-!
-        do kn = kt-1, 1, -1
-          if ( ltri(1,kn) == i1 .and. &
-               ltri(2,kn) == i2 .and. &
-               ltri(3,kn) == i3 ) then
-            go to 5
-          end if
-        end do
-
-        cycle
-!
-!  Store KT as a neighbor of KN.
-!
-5       continue
-
-        ltri(j+3,kn) = kt
-!
-!  Store KN as a neighbor of KT, and add a new arc KA.
-!
-6       continue
-
-        ltri(i+3,kt) = kn
-
-        if ( arcs ) then
-          ka = ka + 1
-          ltri(i+6,kt) = ka
-          if ( kn /= 0 ) then
-            ltri(j+6,kn) = ka
-          end if
-        end if
-
-        end do
-!
-!  Bottom of loop on triangles.
-!
-8     continue
-
-      if ( lp2 /= lpln1 ) then
-        go to 1
-      end if
-
-9     continue
-
-  end do
-
-  nt = kt
-  ier = 0
-
-  return
-end
-subroutine trlist2 ( n, list, lptr, lend, nt, ltri, ier )
-
-!*****************************************************************************80
-!
-!! TRLIST2 converts a triangulation data structure to a triangle list.
-!
-!  Discussion:
-!
-!    This subroutine converts a triangulation data structure
-!    from the linked list created by TRMESH to a triangle list.
-!
-!    It is a version of TRLIST for the special case where the triangle
-!    list should only include the nodes that define each triangle.
-!
-!  Modified:
-!
-!    21 July 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), linked
-!    list data structure defining the triangulation.  Refer to TRMESH.
-!
-!    Output, integer ( kind = 4 ) NT, the number of triangles in the
-!    triangulation unless IER /=0, in which case NT = 0.  NT = 2N-NB-2 if
-!    NB >= 3 or 2N-4 if NB = 0, where NB is the number of boundary nodes.
-!
-!    Output, integer ( kind = 4 ) LTRI(3,*).  The second dimension of LTRI
-!    must be at least NT, where NT will be at most 2*N-4.  The J-th column
-!    contains the vertex nodal indexes associated with triangle J for
-!    J = 1,...,NT.  The vertices are ordered counterclockwise with the first
-!    vertex taken to be the one with smallest index.  Thus, LTRI(2,J) and
-!    LTRI(3,J) are larger than LTRI(1,J) and index adjacent neighbors of node
-!    LTRI(1,J).  The triangles are ordered on first (smallest) vertex indexes.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator.
-!    0, if no errors were encountered.
-!    1, if N is outside its valid range on input.
-!    2, if the triangulation data structure (LIST,LPTR,LEND) is invalid.
-!      Note, however, that these arrays are not completely tested for validity.
-!
-!  Local parameters:
-!
-!    I,J =      LTRI row indexes (1 to 3) associated with
-!               triangles KT and KN, respectively
-!    I1,I2,I3 = Nodal indexes of triangle KN
-!    ISV =      Variable used to permute indexes I1,I2,I3
-!    KA =       Arc index and number of currently stored arcs
-!    KN =       Index of the triangle that shares arc I1-I2 with KT
-!    KT =       Triangle index and number of currently stored triangles
-!    LP =       LIST pointer
-!    LP2 =      Pointer to N2 as a neighbor of N1
-!    LPL =      Pointer to the last neighbor of I1
-!    LPLN1 =    Pointer to the last neighbor of N1
-!    N1,N2,N3 = Nodal indexes of triangle KT
-!    NM2 =      N-2
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) i1
-  integer ( kind = 4 ) i2
-  integer ( kind = 4 ) i3
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) isv
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) ka
-  integer ( kind = 4 ) kn
-  integer ( kind = 4 ) kt
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lp2
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lpln1
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) ltri(3,*)
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) nm2
-  integer ( kind = 4 ) nt
-!
-!  Test for invalid input parameters.
-!
-  if ( n < 3 ) then
-    nt = 0
-    ier = 1
-    return
-  end if
-!
-!  Initialize parameters for loop on triangles KT = (N1,N2,
-!  N3), where N1 < N2 and N1 < N3.
-!
-!  KA,KT = Numbers of currently stored arcs and triangles.
-!  NM2 = Upper bound on candidates for N1.
-!
-  ka = 0
-  kt = 0
-  nm2 = n-2
-!
-!  Loop on nodes N1.
-!
-  do n1 = 1, nm2
-!
-!  Loop on pairs of adjacent neighbors (N2,N3).  LPLN1 points
-!  to the last neighbor of N1, and LP2 points to N2.
-!
-    lpln1 = lend(n1)
-    lp2 = lpln1
-
-1   continue
-
-      lp2 = lptr(lp2)
-      n2 = list(lp2)
-      lp = lptr(lp2)
-      n3 = abs ( list(lp) )
-
-      if ( n2 < n1 .or. n3 < n1 ) then
-        go to 8
-      end if
-!
-!  Add a new triangle KT = (N1,N2,N3).
-!
-      kt = kt + 1
-      ltri(1,kt) = n1
-      ltri(2,kt) = n2
-      ltri(3,kt) = n3
-!
-!  Loop on triangle sides (I2,I1) with neighboring triangles
-!  KN = (I1,I2,I3).
-!
-      do i = 1, 3
-
-        if ( i == 1 ) then
-          i1 = n3
-          i2 = n2
-        else if ( i == 2 ) then
-          i1 = n1
-          i2 = n3
-        else
-          i1 = n2
-          i2 = n1
-        end if
-!
-!  Set I3 to the neighbor of I1 that follows I2 unless
-!  I2->I1 is a boundary arc.
-!
-        lpl = lend(i1)
-        lp = lptr(lpl)
-
-        do
-
-          if ( list(lp) == i2 ) then
-            go to 3
-          end if
-
-          lp = lptr(lp)
-
-          if ( lp == lpl ) then
-            exit
-          end if
-
-        end do
-!
-!  Invalid triangulation data structure:  I1 is a neighbor of
-!  I2, but I2 is not a neighbor of I1.
-!
-        if ( abs ( list(lp) ) /= i2 ) then
-          nt = 0
-          ier = 2
-          return
-        end if
-!
-!  I2 is the last neighbor of I1.  Bypass the search for a neighboring
-!  triangle if I2->I1 is a boundary arc.
-!
-        kn = 0
-
-        if ( list(lp) < 0 ) then
-          go to 6
-        end if
-!
-!  I2->I1 is not a boundary arc, and LP points to I2 as
-!  a neighbor of I1.
-!
-3       continue
-
-        lp = lptr(lp)
-        i3 = abs ( list(lp) )
-!
-!  Find J such that LTRI(J,KN) = I3 (not used if KT < KN),
-!  and permute the vertex indexes of KN so that I1 is smallest.
-!
-        if ( i1 < i2 .and. i1 < i3 ) then
-          j = 3
-        else if ( i2 < i3 ) then
-          j = 2
-          isv = i1
-          i1 = i2
-          i2 = i3
-          i3 = isv
-        else
-          j = 1
-          isv = i1
-          i1 = i3
-          i3 = i2
-          i2 = isv
-        end if
-!
-!  Test for KT < KN (triangle index not yet assigned).
-!
-        if ( n1 < i1 ) then
-          cycle
-        end if
-!
-!  Find KN, if it exists, by searching the triangle list in
-!  reverse order.
-!
-        do kn = kt-1, 1, -1
-          if ( ltri(1,kn) == i1 .and. &
-               ltri(2,kn) == i2 .and. &
-               ltri(3,kn) == i3 ) then
-            go to 5
-          end if
-        end do
-
-        cycle
-
-5       continue
-
-6       continue
-
-        end do
-!
-!  Bottom of loop on triangles.
-!
-8     continue
-
-      if ( lp2 /= lpln1 ) then
-        go to 1
-      end if
-
-9     continue
-
-  end do
-
-  nt = kt
-  ier = 0
-
-  return
-end
-subroutine trlprt ( n, x, y, z, iflag, nrow, nt, ltri )
-
-!*****************************************************************************80
-!
-!! TRLPRT prints a triangle list.
-!
-!  Discussion:
-!
-!    This subroutine prints the triangle list created by TRLIST
-!    and, optionally, the nodal coordinates
-!    (either latitude and longitude or Cartesian coordinates).
-!    The numbers of boundary nodes, triangles, and arcs are also printed.
-!
-!  Modified:
-!
-!    06 June 2002
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N <= 9999.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes if
-!    IFLAG = 0, or (X and Y only) longitude and latitude, respectively,
-!    if 0 < IFLAG, or unused dummy parameters if IFLAG < 0.
-!
-!    Input, integer ( kind = 4 ) IFLAG, nodal coordinate option indicator:
-!    = 0, if X, Y, and Z (assumed to contain Cartesian coordinates) are to
-!      be printed (to 6 decimal places).
-!    > 0, if only X and Y (assumed to contain longitude and latitude) are
-!      to be printed (to 6 decimal places).
-!    < 0, if only the adjacency lists are to be printed.
-!
-!    Input, integer ( kind = 4 ) NROW, the number of rows (entries per triangle)
-!    reserved for the triangle list LTRI.  The value must be 6 if only the
-!    vertex indexes and neighboring triangle indexes are stored, or 9
-!    if arc indexes are also stored.
-!
-!    Input, integer ( kind = 4 ) NT, the number of triangles in the
-!    triangulation.  1 <= NT <= 9999.
-!
-!    Input, integer ( kind = 4 ) LTRI(NROW,NT), the J-th column contains the
-!    vertex nodal indexes (first three rows), neighboring triangle indexes
-!    (second three rows), and, if NROW = 9, arc indexes (last three rows)
-!    associated with triangle J for J = 1,...,NT.
-!
-!  Local parameters:
-!
-!    I =     DO-loop, nodal index, and row index for LTRI
-!    K =     DO-loop and triangle index
-!    NA =    Number of triangulation arcs
-!    NB =    Number of boundary nodes
-!    NL =    Number of lines printed on the current page
-!    NLMAX = Maximum number of print lines per page (except
-!            for the last page which may have two additional lines)
-!    NMAX =  Maximum value of N and NT (4-digit format)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) nrow
-  integer ( kind = 4 ) nt
-
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) iflag
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) ltri(nrow,nt)
-  integer ( kind = 4 ) na
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ), parameter :: nlmax = 58
-  integer ( kind = 4 ), parameter :: nmax = 9999
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-!
-!  Print a heading and test for invalid input.
-!
-  write (*,100) n
-  nl = 3
-
-  if ( n < 3 .or. nmax < n .or. &
-      ( nrow /= 6 .and. nrow /= 9)  .or. &
-      nt < 1 .or. nmax < nt ) then
-    write (*,110) n, nrow, nt
-    return
-  end if
-!
-!  Print X, Y, and Z.
-!
-  if ( iflag == 0 ) then
-
-    write (*,101)
-    nl = 6
-
-    do i = 1, n
-      if ( nlmax <= nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = 0
-      end if
-      write (*,103) i, x(i), y(i), z(i)
-      nl = nl + 1
-    end do
-!
-!  Print X (longitude) and Y (latitude).
-!
-  else if ( 0 < iflag ) then
-
-    write ( *, 102 )
-    nl = 6
-
-    do i = 1, n
-
-      if ( nlmax <= nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = 0
-      end if
-
-      write (*,104) i, x(i), y(i)
-      nl = nl + 1
-
-    end do
-
-  end if
-!
-!  Print the triangulation LTRI.
-!
-  if ( nlmax / 2 < nl ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) ' '
-    nl = 0
-  end if
-
-  if ( nrow == 6 ) then
-    write (*,105)
-  else
-    write (*,106)
-  end if
-
-  nl = nl + 5
-
-  do k = 1, nt
-    if ( nlmax <= nl ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) ' '
-      nl = 0
-    end if
-    write (*,107) k, ltri(1:nrow,k)
-    nl = nl + 1
-  end do
-!
-!  Print NB, NA, and NT (boundary nodes, arcs, and triangles).
-!
-  nb = 2 * n - nt - 2
-
-  if ( nb < 3 ) then
-    nb = 0
-    na = 3 * n - 6
-  else
-    na = nt + n - 1
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Number of boundary nodes NB = ', nb
-  write ( *, '(a,i8)' ) '  Number of arcs NA =           ', na
-  write ( *, '(a,i8)' ) '  Number of triangles NT =      ', nt
-  return
-!
-!  Print formats:
-!
-  100 format (///18x,'STRIPACK (TRLIST) output,  n = ',i4)
-  101 format (//8x,'Node',10x,'X(node)',10x,'Y(node)',10x, &
-          'Z(node)'//)
-  102 format (//16x,'Node        Longitude         Latitude'//)
-  103 format (8x,i4,3e17.6)
-  104 format (16x,i4,2e17.6)
-  105 format (//' triangle',8x,'vertices',12x,'neighbors'/ &
-          4x,'kt',7x,'n1',5x,'n2',5x,'n3',4x,'kt1',4x, &
-          'kt2',4x,'kt3'/)
-  106 format (//'triangle',8x,'vertices',12x,'neighbors',14x,'arcs'/ &
-          4x,'kt       n1     n2     n3    kt1',4x, &
-          'kt2    kt3    ka1    ka2    ka3'/)
-  107 format (2x,i4,2x,6(3x,i4),3(2x,i5))
-  110 format (//1x,10x,'Invalid parameter:  N =',i5, &
-          ', nrow =',i5,', nt =',i5,' ***')
-end
-subroutine trmesh ( n, x, y, z, list, lptr, lend, lnew, near, next, dist, ier )
-
-!*****************************************************************************80
-!
-!! TRMESH creates a Delaunay triangulation on the unit sphere.
-!
-!  Discussion:
-!
-!    This subroutine creates a Delaunay triangulation of a
-!    set of N arbitrarily distributed points, referred to as
-!    nodes, on the surface of the unit sphere.  The Delaunay
-!    triangulation is defined as a set of (spherical) triangles
-!    with the following five properties:
-!
-!     1)  The triangle vertices are nodes.
-!     2)  No triangle contains a node other than its vertices.
-!     3)  The interiors of the triangles are pairwise disjoint.
-!     4)  The union of triangles is the convex hull of the set
-!           of nodes (the smallest convex set that contains
-!           the nodes).  If the nodes are not contained in a
-!           single hemisphere, their convex hull is the
-!           entire sphere and there are no boundary nodes.
-!           Otherwise, there are at least three boundary nodes.
-!     5)  The interior of the circumcircle of each triangle
-!           contains no node.
-!
-!    The first four properties define a triangulation, and the
-!    last property results in a triangulation which is as close
-!    as possible to equiangular in a certain sense and which is
-!    uniquely defined unless four or more nodes lie in a common
-!    plane.  This property makes the triangulation well-suited
-!    for solving closest-point problems and for triangle-based
-!    interpolation.
-!
-!    Provided the nodes are randomly ordered, the algorithm
-!    has expected time complexity O(N*log(N)) for most nodal
-!    distributions.  Note, however, that the complexity may be
-!    as high as O(N**2) if, for example, the nodes are ordered
-!    on increasing latitude.
-!
-!    Spherical coordinates (latitude and longitude) may be
-!    converted to Cartesian coordinates by Subroutine TRANS.
-!
-!    The following is a list of the software package modules
-!    which a user may wish to call directly:
-!
-!    ADDNOD - Updates the triangulation by appending a new node.
-!
-!    AREAS  - Returns the area of a spherical triangle.
-!
-!    BNODES - Returns an array containing the indexes of the
-!             boundary nodes (if any) in counterclockwise
-!             order.  Counts of boundary nodes, triangles,
-!             and arcs are also returned.
-!
-!    CIRCUM - Returns the circumcenter of a spherical triangle.
-!
-!    CRLIST - Returns the set of triangle circumcenters
-!             (Voronoi vertices) and circumradii associated
-!             with a triangulation.
-!
-!    DELARC - Deletes a boundary arc from a triangulation.
-!
-!    DELNOD - Updates the triangulation with a nodal deletion.
-!
-!    EDGE   - Forces an arbitrary pair of nodes to be connected
-!             by an arc in the triangulation.
-!
-!    GETNP  - Determines the ordered sequence of L closest nodes
-!             to a given node, along with the associated distances.
-!
-!    INSIDE - Locates a point relative to a polygon on the
-!             surface of the sphere.
-!
-!    INTRSC - Returns the point of intersection between a
-!             pair of great circle arcs.
-!
-!    JRAND  - Generates a uniformly distributed pseudo-random integer.
-!
-!    LEFT   - Locates a point relative to a great circle.
-!
-!    NEARND - Returns the index of the nearest node to an
-!             arbitrary point, along with its squared
-!             distance.
-!
-!    SCOORD - Converts a point from Cartesian coordinates to
-!             spherical coordinates.
-!
-!    STORE  - Forces a value to be stored in main memory so
-!             that the precision of floating point numbers
-!             in memory locations rather than registers is
-!             computed.
-!
-!    TRANS  - Transforms spherical coordinates into Cartesian
-!             coordinates on the unit sphere for input to
-!             Subroutine TRMESH.
-!
-!    TRLIST - Converts the triangulation data structure to a
-!             triangle list more suitable for use in a finite
-!             element code.
-!
-!    TRLPRT - Prints the triangle list created by TRLIST.
-!
-!    TRMESH - Creates a Delaunay triangulation of a set of
-!             nodes.
-!
-!    TRPLOT - Creates a level-2 Encapsulated Postscript (EPS)
-!             file containing a triangulation plot.
-!
-!    TRPRNT - Prints the triangulation data structure and,
-!             optionally, the nodal coordinates.
-!
-!    VRPLOT - Creates a level-2 Encapsulated Postscript (EPS)
-!             file containing a Voronoi diagram plot.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of distinct
-!    nodes.  (X(K),Y(K), Z(K)) is referred to as node K, and K is referred
-!    to as a nodal index.  It is required that X(K)**2 + Y(K)**2 + Z(K)**2 = 1
-!    for all K.  The first three nodes must not be collinear (lie on a
-!    common great circle).
-!
-!    Output, integer ( kind = 4 ) LIST(6*(N-2)), nodal indexes which, along
-!    with LPTR, LEND, and LNEW, define the triangulation as a set of N
-!    adjacency lists; counterclockwise-ordered sequences of neighboring nodes
-!    such that the first and last neighbors of a boundary node are boundary
-!    nodes (the first neighbor of an interior node is arbitrary).  In order to
-!    distinguish between interior and boundary nodes, the last neighbor of
-!    each boundary node is represented by the negative of its index.
-!
-!    Output, integer ( kind = 4 ) LPTR(6*(N-2)), = Set of pointers (LIST
-!    indexes) in one-to-one correspondence with the elements of LIST.
-!    LIST(LPTR(I)) indexes the node which follows LIST(I) in cyclical
-!    counterclockwise order (the first neighbor follows the last neighbor).
-!
-!    Output, integer ( kind = 4 ) LEND(N), pointers to adjacency lists.
-!    LEND(K) points to the last neighbor of node K.  LIST(LEND(K)) < 0 if and
-!    only if K is a boundary node.
-!
-!    Output, integer ( kind = 4 ) LNEW, pointer to the first empty location
-!    in LIST and LPTR (list length plus one).  LIST, LPTR, LEND, and LNEW are
-!    not altered if IER < 0, and are incomplete if 0 < IER.
-!
-!    Workspace, integer ( kind = 4 ) NEAR(N),
-!    used to efficiently determine the nearest triangulation node to each
-!    unprocessed node for use by ADDNOD.
-!
-!    Workspace, integer ( kind = 4 ) NEXT(N),
-!    used to efficiently determine the nearest triangulation node to each
-!    unprocessed node for use by ADDNOD.
-!
-!    Workspace, real ( kind = 8 ) DIST(N),
-!    used to efficiently determine the nearest triangulation node to each
-!    unprocessed node for use by ADDNOD.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!     0, if no errors were encountered.
-!    -1, if N < 3 on input.
-!    -2, if the first three nodes are collinear.
-!     L, if nodes L and M coincide for some L < M.  The data structure
-!      represents a triangulation of nodes 1 to M-1 in this case.
-!
-!  Local parameters:
-!
-!    D =        (Negative cosine of) distance from node K to node I
-!    D1,D2,D3 = Distances from node K to nodes 1, 2, and 3, respectively
-!    I,J =      Nodal indexes
-!    I0 =       Index of the node preceding I in a sequence of
-!               unprocessed nodes:  I = NEXT(I0)
-!    K =        Index of node to be added and DO-loop index: 3 < K
-!    LP =       LIST index (pointer) of a neighbor of K
-!    LPL =      Pointer to the last neighbor of K
-!    NEXTI =    NEXT(I)
-!    NN =       Local copy of N
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) d
-  real    ( kind = 8 ) d1
-  real    ( kind = 8 ) d2
-  real    ( kind = 8 ) d3
-  real    ( kind = 8 ) dist(n)
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) i0
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) j
-  integer ( kind = 4 ) k
-  logical left
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) near(n)
-  integer ( kind = 4 ) next(n)
-  integer ( kind = 4 ) nexti
-  integer ( kind = 4 ) nn
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nn = n
-
-  if ( nn < 3 ) then
-    ier = -1
-    return
-  end if
-!
-!  Store the first triangle in the linked list.
-!
-  if ( .not. left (x(1),y(1),z(1),x(2),y(2),z(2), &
-                   x(3),y(3),z(3) ) ) then
-!
-!  The first triangle is (3,2,1) = (2,1,3) = (1,3,2).
-!
-    list(1) = 3
-    lptr(1) = 2
-    list(2) = -2
-    lptr(2) = 1
-    lend(1) = 2
-
-    list(3) = 1
-    lptr(3) = 4
-    list(4) = -3
-    lptr(4) = 3
-    lend(2) = 4
-
-    list(5) = 2
-    lptr(5) = 6
-    list(6) = -1
-    lptr(6) = 5
-    lend(3) = 6
-
-  else if ( .not. left ( x(2),y(2),z(2),x(1),y(1),z(1),x(3),y(3),z(3) ) ) then
-!
-!  The first triangle is (1,2,3):  3 Strictly Left 1->2,
-!  i.e., node 3 lies in the left hemisphere defined by arc 1->2.
-!
-    list(1) = 2
-    lptr(1) = 2
-    list(2) = -3
-    lptr(2) = 1
-    lend(1) = 2
-
-    list(3) = 3
-    lptr(3) = 4
-    list(4) = -1
-    lptr(4) = 3
-    lend(2) = 4
-
-    list(5) = 1
-    lptr(5) = 6
-    list(6) = -2
-    lptr(6) = 5
-    lend(3) = 6
-!
-!  The first three nodes are collinear.
-!
-  else
-
-    ier = -2
-    return
-  end if
-!
-!  Initialize LNEW and test for N = 3.
-!
-  lnew = 7
-
-  if ( nn == 3 ) then
-    ier = 0
-    return
-  end if
-!
-!  A nearest-node data structure (NEAR, NEXT, and DIST) is
-!  used to obtain an expected-time (N*log(N)) incremental
-!  algorithm by enabling constant search time for locating
-!  each new node in the triangulation.
-!
-!  For each unprocessed node K, NEAR(K) is the index of the
-!  triangulation node closest to K (used as the starting
-!  point for the search in Subroutine TRFIND) and DIST(K)
-!  is an increasing function of the arc length (angular
-!  distance) between nodes K and NEAR(K):  -Cos(a) for arc
-!  length a.
-!
-!  Since it is necessary to efficiently find the subset of
-!  unprocessed nodes associated with each triangulation
-!  node J (those that have J as their NEAR entries), the
-!  subsets are stored in NEAR and NEXT as follows:  for
-!  each node J in the triangulation, I = NEAR(J) is the
-!  first unprocessed node in J's set (with I = 0 if the
-!  set is empty), L = NEXT(I) (if 0 < I) is the second,
-!  NEXT(L) (if 0 < L) is the third, etc.  The nodes in each
-!  set are initially ordered by increasing indexes (which
-!  maximizes efficiency) but that ordering is not main-
-!  tained as the data structure is updated.
-!
-!  Initialize the data structure for the single triangle.
-!
-  near(1) = 0
-  near(2) = 0
-  near(3) = 0
-
-  do k = nn, 4, -1
-
-    d1 = -( x(k) * x(1) + y(k) * y(1) + z(k) * z(1) )
-    d2 = -( x(k) * x(2) + y(k) * y(2) + z(k) * z(2) )
-    d3 = -( x(k) * x(3) + y(k) * y(3) + z(k) * z(3) )
-
-    if ( d1 <= d2 .and. d1 <= d3 ) then
-      near(k) = 1
-      dist(k) = d1
-      next(k) = near(1)
-      near(1) = k
-    else if ( d2 <= d1 .and. d2 <= d3 ) then
-      near(k) = 2
-      dist(k) = d2
-      next(k) = near(2)
-      near(2) = k
-    else
-      near(k) = 3
-      dist(k) = d3
-      next(k) = near(3)
-      near(3) = k
-    end if
-
-  end do
-!
-!  Add the remaining nodes.
-!
-  do k = 4, nn
-
-    call addnod ( near(k), k, x, y, z, list, lptr, lend, lnew, ier )
-
-    if ( ier /= 0 ) then
-       return
-    end if
-!
-!  Remove K from the set of unprocessed nodes associated with NEAR(K).
-!
-    i = near(k)
-
-    if ( near(i) == k ) then
-
-      near(i) = next(k)
-
-    else
-
-      i = near(i)
-
-      do
-
-        i0 = i
-        i = next(i0)
-
-        if ( i == k ) then
-          exit
-        end if
-
-      end do
-
-      next(i0) = next(k)
-
-    end if
-
-    near(k) = 0
-!
-!  Loop on neighbors J of node K.
-!
-    lpl = lend(k)
-    lp = lpl
-
-3   continue
-
-    lp = lptr(lp)
-    j = abs ( list(lp) )
-!
-!  Loop on elements I in the sequence of unprocessed nodes
-!  associated with J:  K is a candidate for replacing J
-!  as the nearest triangulation node to I.  The next value
-!  of I in the sequence, NEXT(I), must be saved before I
-!  is moved because it is altered by adding I to K's set.
-!
-    i = near(j)
-
-    do
-
-      if ( i == 0 ) then
-        exit
-      end if
-
-      nexti = next(i)
-!
-!  Test for the distance from I to K less than the distance
-!  from I to J.
-!
-      d = - ( x(i) * x(k) + y(i) * y(k) + z(i) * z(k) )
-      if ( d < dist(i) ) then
-!
-!  Replace J by K as the nearest triangulation node to I:
-!  update NEAR(I) and DIST(I), and remove I from J's set
-!  of unprocessed nodes and add it to K's set.
-!
-        near(i) = k
-        dist(i) = d
-
-        if ( i == near(j) ) then
-          near(j) = nexti
-        else
-          next(i0) = nexti
-        end if
-
-        next(i) = near(k)
-        near(k) = i
-      else
-        i0 = i
-      end if
-
-      i = nexti
-
-    end do
-!
-!  Bottom of loop on neighbors J.
-!
-5   continue
-
-    if ( lp /= lpl ) then
-      go to 3
-    end if
-
-6   continue
-
-  end do
-
-  return
-end
-subroutine trplot ( lun, pltsiz, elat, elon, a, n, x, y, z, list, lptr, &
-  lend, title, numbr, ier )
-
-!*****************************************************************************80
-!
-!! TRPLOT makes a PostScript image of a triangulation on a unit sphere.
-!
-!  Discussion:
-!
-!    This subroutine creates a level-2 Encapsulated Postscript (EPS)
-!    file containing a graphical display of a triangulation of a set of
-!    nodes on the unit sphere.  The visible nodes are projected onto the
-!    plane that contains the origin and has normal defined by a
-!    user-specified eye-position.  Projections of adjacent (visible) nodes
-!    are connected by line segments.
-!
-!    The values in the data statements may be altered
-!    in order to modify various plotting options.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LUN, the logical unit number in the range 0
-!    to 99.  The unit should be opened with an appropriate
-!    file name before the call to this routine.
-!
-!    Input, real ( kind = 8 ) PLTSIZ, the plot size in inches.  A circular
-!    window in the projection plane is mapped to a circular viewport with
-!    diameter equal to 0.88 * PLTSIZ (leaving room for labels outside the
-!    viewport).  The viewport is centered on the 8.5 by 11 inch page, and
-!    its boundary is drawn.  1.0 <= PLTSIZ <= 8.5.
-!
-!    Input, real ( kind = 8 ) ELAT, ELON, the latitude and longitude
-!    (in degrees) of the center of projection E (the center of the plot).
-!    The projection plane is the plane that contains the origin and has
-!    E as unit normal.  In a rotated coordinate system for which E is
-!    the north pole, the projection plane contains the equator, and only
-!    northern hemisphere nodes are visible (from the point at infinity in
-!    the direction E).  These are projected orthogonally onto the
-!    projection plane (by zeroing the z-component in the rotated coordinate
-!    system).  ELAT and ELON must be in the range -90 to 90 and -180 to
-!    180, respectively.
-!
-!    Input, real ( kind = 8 ) A, the angular distance in degrees from E
-!    to the boundary of a circular window against which the triangulation
-!    is clipped.  The projected window is a disk of radius R = Sin(A)
-!    centered at the origin, and only visible nodes whose projections are
-!    within distance R of the origin are included in the plot.  Thus, if
-!    A = 90, the plot includes the entire hemisphere centered at E.
-!    0 < A <= 90.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes in the triangulation.
-!    3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N). the coordinates of the
-!    nodes (unit vectors).
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the
-!    data structure defining the triangulation, created by TRMESH.
-!
-!    Input, character ( len = * ) TITLE, a string to be centered above the
-!    plot.  The string must be enclosed in parentheses; i.e., the first and
-!    last characters must be '(' and ')', respectively, but these are not
-!    displayed.  TITLE may have at most 80 characters including the parentheses.
-!
-!    Input, logical NUMBR, option indicator:  If NUMBR = TRUE, the
-!    nodal indexes are plotted next to the nodes.
-!
-!    Output, integer ( kind = 4 ) IER, error indicator:
-!    0, if no errors were encountered.
-!    1, if LUN, PLTSIZ, or N is outside its valid range.
-!    2, if ELAT, ELON, or A is outside its valid range.
-!    3, if an error was encountered in writing to unit LUN.
-!
-!  Local parameters:
-!
-!    ANNOT =     Logical variable with value TRUE iff the plot
-!                is to be annotated with the values of ELAT,
-!                ELON, and A
-!    CF =        Conversion factor for degrees to radians
-!    CT =        Cos(ELAT)
-!    EX,EY,EZ =  Cartesian coordinates of the eye-position E
-!    FSIZN =     Font size in points for labeling nodes with
-!                their indexes if NUMBR = TRUE
-!    FSIZT =     Font size in points for the title (and
-!                annotation if ANNOT = TRUE)
-!    IPX1,IPY1 = X and y coordinates (in points) of the lower
-!                  left corner of the bounding box or viewport box
-!    IPX2,IPY2 = X and y coordinates (in points) of the upper
-!                right corner of the bounding box or viewport box
-!    IR =        Half the width (height) of the bounding box or
-!                viewport box in points -- viewport radius
-!    LP =        LIST index (pointer)
-!    LPL =       Pointer to the last neighbor of N0
-!    N0 =        Index of a node whose incident arcs are to be drawn
-!    N1 =        Neighbor of N0
-!    R11...R23 = Components of the first two rows of a rotation
-!                that maps E to the north pole (0,0,1)
-!    SF =        Scale factor for mapping world coordinates
-!                (window coordinates in [-WR,WR] X [-WR,WR])
-!                to viewport coordinates in [IPX1,IPX2] X [IPY1,IPY2]
-!    T =         Temporary variable
-!    TX,TY =     Translation vector for mapping world coordi-
-!                nates to viewport coordinates
-!    WR =        Window radius r = Sin(A)
-!    WRS =       WR**2
-!    X0,Y0,Z0 =  Coordinates of N0 in the rotated coordinate
-!                system or label location (X0,Y0)
-!    X1,Y1,Z1 =  Coordinates of N1 in the rotated coordinate
-!                system or intersection of edge N0-N1 with
-!                the equator (in the rotated coordinate system)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  real    ( kind = 8 ) a
-  logical, parameter :: annot = .true.
-  real    ( kind = 8 ) cf
-  real    ( kind = 8 ) ct
-  real    ( kind = 8 ) elat
-  real    ( kind = 8 ) elon
-  real    ( kind = 8 ) ex
-  real    ( kind = 8 ) ey
-  real    ( kind = 8 ) ez
-  real    ( kind = 8 ), parameter :: fsizn = 10.0D+00
-  real    ( kind = 8 ), parameter :: fsizt = 16.0D+00
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) ipx1
-  integer ( kind = 4 ) ipx2
-  integer ( kind = 4 ) ipy1
-  integer ( kind = 4 ) ipy2
-  integer ( kind = 4 ) ir
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lun
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  logical numbr
-  real    ( kind = 8 ) pltsiz
-  real    ( kind = 8 ) r11
-  real    ( kind = 8 ) r12
-  real    ( kind = 8 ) r21
-  real    ( kind = 8 ) r22
-  real    ( kind = 8 ) r23
-  real    ( kind = 8 ) sf
-  real    ( kind = 8 ) t
-  character ( len = * ) title
-  real    ( kind = 8 ) tx
-  real    ( kind = 8 ) ty
-  real    ( kind = 8 ) wr
-  real    ( kind = 8 ) wrs
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) z0
-  real    ( kind = 8 ) z1
-
-  ier = 0
-!
-!  Test for invalid parameters.
-!
-  if ( lun < 0 ) then
-    ier = 1
-    return
-  end if
-
-  if ( 99 < lun ) then
-    ier = 1
-    return
-  end if
-
-  if ( pltsiz < 1.0D+00 ) then
-    ier = 1
-    return
-  else if ( 8.5D+00 < pltsiz ) then
-    ier = 1
-    return
-  else if ( n < 3 ) then
-    ier = 1
-    return
-  end if
-
-  if ( 90.0D+00 < abs ( elat ) ) then
-    ier = 2
-    return
-  else if ( 180.0D+00 < abs ( elon ) ) then
-    ier = 2
-    return
-  else if ( 90.0D+00 < a ) then
-    ier = 2
-    return
-  end if
-!
-!  Compute a conversion factor CF for degrees to radians.
-!
-  cf = atan ( 1.0D+00 ) / 45.0D+00
-!
-!  Compute the window radius WR.
-!
-  wr = sin ( cf * a )
-  wrs = wr * wr
-!
-!  Compute the lower left (IPX1,IPY1) and upper right
-!  (IPX2,IPY2) corner coordinates of the bounding box.
-!  The coordinates, specified in default user space units
-!  (points, at 72 points/inch with origin at the lower
-!  left corner of the page), are chosen to preserve the
-!  square aspect ratio, and to center the plot on the 8.5
-!  by 11 inch page.  The center of the page is (306,396),
-!  and IR = PLTSIZ/2 in points.
-!
-  ir = nint ( 36.0D+00 * pltsiz )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Output header comments.
-!
-  write ( lun, '(a)' ) '%!ps-adobe-3.0 epsf-3.0'
-  write ( lun, '(a,4i4)' ) '%%BoundingBox:', ipx1, ipy1, ipx2, ipy2
-  write ( lun, '(a)' ) '%%title:  Triangulation'
-  write ( lun, '(a)' ) '%%creator:  STRIPACK.F90'
-  write ( lun, '(a)' ) '%%endcomments'
-!
-!  Set (IPX1,IPY1) and (IPX2,IPY2) to the corner coordinates
-!  of a viewport box obtained by shrinking the bounding box
-!  by 12% in each dimension.
-!
-  ir = nint ( 0.88D+00 * real ( ir, kind = 8 ) )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Set the line thickness to 2 points, and draw the
-!  viewport boundary.
-!
-  t = 2.0D+00
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-  write ( lun, '(a,i3,a)' ) '306 396 ', ir, ' 0 360 arc'
-  write ( lun, '(a)' ) 'stroke'
-!
-!  Set up an affine mapping from the window box [-WR,WR] X
-!  [-WR,WR] to the viewport box.
-!
-  sf = real ( ir, kind = 8 ) / wr
-  tx = ipx1 + sf * wr
-  ty = ipy1 + sf * wr
-  write ( lun, '(2f12.6,a)' ) tx, ty, ' translate'
-  write ( lun, '(2f12.6,a)' ) sf, sf, ' scale'
-!
-!  The line thickness must be changed to reflect the new
-!  scaling which is applied to all subsequent output.
-!  Set it to 1.0 point.
-!
-  t = 1.0D+00 / sf
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-!
-!  Save the current graphics state, and set the clip path to
-!  the boundary of the window.
-!
-  write ( lun, '(a)' ) 'gsave'
-  write ( lun, '(a,f12.6,a)' ) '0 0 ', wr, ' 0 360 arc'
-  write ( lun, '(a)' ) 'clip newpath'
-!
-!  Compute the Cartesian coordinates of E and the components
-!  of a rotation R which maps E to the north pole (0,0,1).
-!  R is taken to be a rotation about the z-axis (into the
-!  yz-plane) followed by a rotation about the x-axis chosen
-!  so that the view-up direction is (0,0,1), or (-1,0,0) if
-!  E is the north or south pole.
-!
-!           ( R11  R12  0   )
-!       R = ( R21  R22  R23 )
-!           ( EX   EY   EZ  )
-!
-  t = cf * elon
-  ct = cos ( cf * elat )
-  ex = ct * cos ( t )
-  ey = ct * sin ( t )
-  ez = sin ( cf * elat )
-
-  if ( ct /= 0.0D+00 ) then
-    r11 = -ey / ct
-    r12 = ex / ct
-  else
-    r11 = 0.0D+00
-    r12 = 1.0D+00
-  end if
-
-  r21 = -ez * r12
-  r22 = ez * r11
-  r23 = ct
-!
-!  Loop on visible nodes N0 that project to points (X0,Y0) in the window.
-!
-  do n0 = 1, n
-
-    z0 = ex * x(n0) + ey * y(n0) + ez * z(n0)
-
-    if ( z0 < 0.0D+00 ) then
-      cycle
-    end if
-
-    x0 = r11 * x(n0) + r12 * y(n0)
-    y0 = r21 * x(n0) + r22 * y(n0) + r23 * z(n0)
-
-    if ( wrs < x0 * x0 + y0 * y0 ) then
-      cycle
-    end if
-
-    lpl = lend(n0)
-    lp = lpl
-!
-!  Loop on neighbors N1 of N0.  LPL points to the last
-!  neighbor of N0.  Copy the components of N1 into P.
-!
-    do
-
-      lp = lptr(lp)
-      n1 = abs ( list(lp) )
-
-      x1 = r11 * x(n1) + r12 * y(n1)
-      y1 = r21 * x(n1) + r22 * y(n1) + r23 * z(n1)
-      z1 = ex  * x(n1) + ey  * y(n1) + ez  * z(n1)
-!
-!  N1 is a 'southern hemisphere' point.  Move it to the
-!  intersection of edge N0-N1 with the equator so that
-!  the edge is clipped properly.  Z1 is implicitly set
-!  to 0.
-!
-      if ( z1 < 0.0D+00 ) then
-        x1 = z0 * x1 - z1 * x0
-        y1 = z0 * y1 - z1 * y0
-        t = sqrt ( x1 * x1 + y1 * y1 )
-        x1 = x1 / t
-        y1 = y1 / t
-      end if
-!
-!  If node N1 is in the window and N1 < N0, bypass edge
-!  N0->N1 (since edge N1->N0 has already been drawn).
-!
-!  Add the edge to the path.
-!
-      if ( z1 < 0.0D+00 .or. &
-           wrs < x1 * x1 + y1 * y1 .or. &
-           n0 <= n1 ) then
-
-        write ( lun, '(2f12.6,a,2f12.6,a)' ) &
-          x0, y0, ' moveto', x1, y1, ' lineto'
-
-      end if
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-!
-!  Paint the path and restore the saved graphics state (with
-!  no clip path).
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'grestore'
-
-  if ( numbr ) then
-!
-!  Nodes in the window are to be labeled with their indexes.
-!  Convert FSIZN from points to world coordinates, and
-!  output the commands to select a font and scale it.
-!
-    t = fsizn / sf
-
-    write ( lun, '(a)' ) '/Helvetica findfont'
-    write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Loop on visible nodes N0 that project to points (X0,Y0) in the window.
-!
-    do n0 = 1, n
-
-      if ( ex * x(n0) + ey * y(n0) + ez * z(n0) < 0.0D+00 ) then
-        cycle
-      end if
-
-      x0 = r11 * x(n0) + r12 * y(n0)
-      y0 = r21 * x(n0) + r22 * y(n0) + r23 * z(n0)
-
-      if ( wrs < x0 * x0 + y0 * y0 ) then
-        cycle
-      end if
-!
-!  Move to (X0,Y0) and draw the label N0.  The first char-
-!  acter will will have its lower left corner about one
-!  character width to the right of the nodal position.
-!
-      write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-      write ( lun, '(a,i3,a)' ) '(', n0, ') show'
-
-    end do
-
-  end if
-!
-!  Convert FSIZT from points to world coordinates, and output
-!  the commands to select a font and scale it.
-!
-  t = fsizt / sf
-  write ( lun, '(a)' ) '/Helvetica findfont'
-  write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Display TITLE centered above the plot:
-!
-  y0 = wr + 3.0D+00 * t
-
-  write ( lun, '(a)' ) title
-  write ( lun, '(a,f12.6,a)' ) '  stringwidth pop 2 div neg ', y0, ' moveto'
-  write ( lun, '(a)' ) title
-  write ( lun, '(a)' ) '  show'
-!
-!  Display the window center and radius below the plot.
-!
-  if ( annot ) then
-
-    x0 = -wr
-    y0 = -wr - 50.0D+00 / sf
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f7.2,a,f8.2,a)' ) '(Window center:  Latitude = ', elat, &
-      ', Longitude = ', elon , ') show'
-    y0 = y0 - 2.0D+00 * t
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f5.2,a)' ) '(Angular extent = ', a, ') show'
-
-  end if
-!
-!  Paint the path and output the showpage command and
-!  end-of-file indicator.
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'showpage'
-  write ( lun, '(a)' ) '%%eof'
-
-  ier = 0
-
-  return
-end
-subroutine trprnt ( n, x, y, z, iflag, list, lptr, lend )
-
-!*****************************************************************************80
-!
-!! TRPRNT prints the triangulation adjacency lists.
-!
-!  Discussion:
-!
-!    This subroutine prints the triangulation adjacency lists
-!    created by TRMESH and, optionally, the nodal
-!    coordinates (either latitude and longitude or Cartesian
-!    coordinates) on logical unit LOUT.  The list of neighbors
-!    of a boundary node is followed by index 0.  The numbers of
-!    boundary nodes, triangles, and arcs are also printed.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N = Number of nodes in the triangulation.
-!    3 <= N and N <= 9999.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the Cartesian coordinates of
-!    the nodes if IFLAG = 0, or (X and Y only) containing longitude and
-!    latitude, respectively, if 0  < IFLAG, or unused dummy parameters if
-!    IFLAG < 0.
-!
-!    Input, integer ( kind = 4 ) IFLAG = Nodal coordinate option indicator:
-!    = 0 if X, Y, and Z (assumed to contain Cartesian coordinates) are to be
-!      printed (to 6 decimal places).
-!    > 0 if only X and Y (assumed to contain longitude and latitude) are
-!      to be printed (to 6 decimal places).
-!    < 0 if only the adjacency lists are to be printed.
-!
-!    Input, integer ( kind = 4 ) LIST(6*(N-2)), LPTR(6*(N-2)), LEND(N), the
-!    data structure defining the triangulation.  Refer to TRMESH.
-!
-!  Local parameters:
-!
-!    I =     NABOR index (1 to K)
-!    INC =   Increment for NL associated with an adjacency list
-!    K =     Counter and number of neighbors of NODE
-!    LP =    LIST pointer of a neighbor of NODE
-!    LPL =   Pointer to the last neighbor of NODE
-!    NA =    Number of arcs in the triangulation
-!    NABOR = Array containing the adjacency list associated
-!            with NODE, with zero appended if NODE is a boundary node
-!    NB =    Number of boundary nodes encountered
-!    ND =    Index of a neighbor of NODE (or negative index)
-!    NL =    Number of lines that have been printed on the current page
-!    NLMAX = Maximum number of print lines per page (except
-!            for the last page which may have two additional lines)
-!    NMAX =  Upper bound on N (allows 4-digit indexes)
-!    NODE =  Index of a node and DO-loop index (1 to N)
-!    NN =    Local copy of N
-!    NT =    Number of triangles in the triangulation
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-
-  integer ( kind = 4 ) iflag
-  integer ( kind = 4 ) inc
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) list(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) na
-  integer ( kind = 4 ) nabor(400)
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nd
-  integer ( kind = 4 ) nl
-  integer ( kind = 4 ), parameter :: nlmax = 58
-  integer ( kind = 4 ), parameter :: nmax = 9999
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) node
-  integer ( kind = 4 ) nt
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) z(n)
-
-  nn = n
-!
-!  Print a heading and test the range of N.
-!
-  write (*,100) nn
-
-  if ( nn < 3 .or. nmax < nn ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TRPRNT - Fatal error!'
-    write ( *, '(a)' ) '  N is outside its valid range.'
-    return
-  end if
-!
-!  Initialize NL (the number of lines printed on the current
-!  page) and NB (the number of boundary nodes encountered).
-!
-  nl = 6
-  nb = 0
-!
-!  Print LIST only.  K is the number of neighbors of NODE
-!  that have been stored in NABOR.
-!
-  if ( iflag < 0 ) then
-
-    write (*,101)
-
-    do node = 1, nn
-
-      lpl = lend(node)
-      lp = lpl
-      k = 0
-
-      do
-
-        k = k + 1
-        lp = lptr(lp)
-        nd = list(lp)
-        nabor(k) = nd
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-!
-!  NODE is a boundary node.  Correct the sign of the last
-!  neighbor, add 0 to the end of the list, and increment NB.
-!
-      if ( nd <= 0 ) then
-        nabor(k) = -nd
-        k = k + 1
-        nabor(k) = 0
-        nb = nb + 1
-
-      end if
-!
-!  Increment NL and print the list of neighbors.
-!
-      inc = ( k - 1 ) / 14 + 2
-      nl = nl + inc
-
-      if ( nlmax < nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = inc
-      end if
-
-      write (*,104) node, nabor(1:k)
-      if ( k /= 14 ) then
-        write ( *, '(a)' ) ' '
-      end if
-
-    end do
-
-  else if ( 0 < iflag ) then
-!
-!  Print X (longitude), Y (latitude), and LIST.
-!
-    write (*,102)
-
-    do node = 1, nn
-
-      lpl = lend(node)
-      lp = lpl
-      k = 0
-
-      do
-
-        k = k + 1
-        lp = lptr(lp)
-        nd = list(lp)
-        nabor(k) = nd
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-
-      if ( nd <= 0 ) then
-!
-!  NODE is a boundary node.
-!
-        nabor(k) = -nd
-        k = k + 1
-        nabor(k) = 0
-        nb = nb + 1
-      end if
-!
-!  Increment NL and print X, Y, and NABOR.
-!
-      inc = ( k - 1 ) / 8 + 2
-      nl = nl + inc
-
-      if ( nlmax < nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = inc
-      end if
-
-      write (*,105) node, x(node), y(node), nabor(1:k)
-
-      if ( k /= 8 ) then
-        write ( *, '(a)' ) ' '
-      end if
-
-    end do
-
-  else
-!
-!  Print X, Y, Z, and LIST.
-!
-    write (*,103)
-
-    do node = 1, nn
-
-      lpl = lend(node)
-      lp = lpl
-      k = 0
-
-      do
-
-        k = k + 1
-        lp = lptr(lp)
-        nd = list(lp)
-        nabor(k) = nd
-
-        if ( lp == lpl ) then
-          exit
-        end if
-
-      end do
-!
-!  NODE is a boundary node.
-!
-      if ( nd <= 0 ) then
-        nabor(k) = -nd
-        k = k + 1
-        nabor(k) = 0
-        nb = nb + 1
-      end if
-!
-!  Increment NL and print X, Y, Z, and NABOR.
-!
-      inc = ( k - 1 ) / 5 + 2
-      nl = nl + inc
-
-      if ( nlmax < nl ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) ' '
-        nl = inc
-      end if
-
-      write (*,106) node, x(node), y(node), z(node), nabor(1:k)
-
-      if ( k /= 5 ) then
-        write ( *, '(a)' ) ' '
-      end if
-
-    end do
-
-  end if
-!
-!  Print NB, NA, and NT (boundary nodes, arcs, and triangles).
-!
-  if ( nb /= 0 ) then
-    na = 3 * nn - nb - 3
-    nt = 2 * nn - nb - 2
-  else
-    na = 3 * nn - 6
-    nt = 2 * nn - 4
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8,a)' ) '  NB = ', nb, ' boundary arcs.'
-  write ( *, '(a,i8,a)' ) '  NA = ', na, ' arcs.'
-  write ( *, '(a,i8,a)' ) '  NT = ', nt, ' triangles.'
-
-  return
-!
-!  Print formats:
-!
-  100 format (///15x,'STRIPACK triangulation data ', &
-          'structure,  n = ',i5//)
-  101 format (' node',31x,'neighbors of node'//)
-  102 format (' Node    Longitude      Latitude', &
-          18x,'neighbors of node'//)
-  103 format (' node     x(node)        y(node)',8x, &
-          'z(node)',11x,'neighbors of node'//)
-  104 format (i5,4x,14i5/(1x,8x,14i5))
-  105 format (i5,2e15.6,4x,8i5/(1x,38x,8i5))
-  106 format (i5,3e15.6,4x,5i5/(1x,53x,5i5))
-end
-subroutine voronoi_poly_count ( n, lend, lptr, listc )
-
-!*****************************************************************************80
-!
-!! VORONOI_POLY_COUNT counts the polygons of each size in the Voronoi diagram.
-!
-!  Modified:
-!
-!    06 June 2002
-!
-!  Author:
-!
-!    John Burkardt
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) N, the number of Voronoi polygons.
-!
-!    Input, integer ( kind = 4 ) LEND(N), some kind of pointer.
-!
-!    Input, integer ( kind = 4 ) LPTR(6*(N-2)), some other kind of pointer.
-!
-!    Input, integer ( kind = 4 ) LISTC(6*(N-2)), some other kind of pointer.
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ), parameter :: side_max = 20
-
-  integer ( kind = 4 ) count(side_max)
-  integer ( kind = 4 ) edges
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) kv
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) listc(6*(n-2))
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) sides
-  integer ( kind = 4 ) vertices
-
-  count(1:side_max) = 0
-
-  edges = 0
-  vertices = 0
-
-  do n0 = 1, n
-
-    lpl = lend(n0)
-
-    lp = lpl
-
-    sides = 0
-
-    do
-
-      lp = lptr(lp)
-      kv = listc(lp)
-
-      vertices = max ( vertices, kv )
-      sides = sides + 1
-      edges = edges + 1
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-    if ( 0 < sides .and. sides < side_max ) then
-      count(sides) = count(sides) + 1
-    else
-      count(side_max) = count(side_max) + 1
-    end if
-
-  end do
-
-  edges = edges / 2
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'VORONOI_POLY_COUNT'
-  write ( *, '(a)' ) '  Number of polygons of each shape.'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Faces =    ', n
-  write ( *, '(a,i8)' ) '  Vertices = ', vertices
-  write ( *, '(a,i8)' ) '  Edges =    ', edges
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  F+V-E-2 =  ', n + vertices - edges - 2
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) ' Sides  Number'
-  write ( *, '(a)' ) ' '
-
-  do i = 1, side_max - 1
-    if ( count(i) /= 0 ) then
-      write ( *, '(2x,i8,2x,i8)' ) i, count(i)
-    end if
-  end do
-
-  if ( count(side_max) /= 0 ) then
-    write ( *, '(2x,i8,2x,i8)' ) side_max, count(side_max)
-  end if
-
-
-  return
-end
-subroutine vrplot ( lun, pltsiz, elat, elon, a, n, x, y, z, nt, listc, lptr, &
-  lend, xc, yc, zc, title, numbr, ier )
-
-!*****************************************************************************80
-!
-!! VRPLOT makes a PostScript image of a Voronoi diagram on the unit sphere.
-!
-!  Discussion:
-!
-!    This subroutine creates a level-2 Encapsulated Postscript
-!    (EPS) file containing a graphical depiction of a
-!    Voronoi diagram of a set of nodes on the unit sphere.
-!    The visible vertices are projected onto the plane that
-!    contains the origin and has normal defined by a user-
-!    specified eye-position.  Projections of adjacent (visible)
-!    Voronoi vertices are connected by line segments.
-!
-!    The parameters defining the Voronoi diagram may be computed by
-!    subroutine CRLIST.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-!  Author:
-!
-!    Robert Renka
-!
-!  Reference:
-!
-!    Robert Renka,
-!    Algorithm 772: STRIPACK,
-!    Delaunay Triangulation and Voronoi Diagram on the Surface of a Sphere,
-!    ACM Transactions on Mathematical Software,
-!    Volume 23, Number 3, September 1997, pages 416-434.
-!
-!  Parameters:
-!
-!    Input, integer ( kind = 4 ) LUN, the logical unit number in the range 0
-!    to 99.  The unit should be opened with an appropriate
-!    file name before the call to this routine.
-!
-!    Input, real ( kind = 8 ) PLTSIZ, the plot size in inches.  A circular
-!    window in the projection plane is mapped to a circular viewport with
-!    diameter equal to .88*PLTSIZ (leaving room for labels outside the
-!    viewport).  The viewport is centered on the 8.5 by 11 inch page, and its
-!    boundary is drawn.  1.0 <= PLTSIZ <= 8.5.
-!
-!    Input, real ( kind = 8 ) ELAT, ELON, the latitude and longitude (in
-!    degrees) of the center of projection E (the center of the plot).  The
-!    projection plane is the plane that contains the origin and has E as unit
-!    normal.  In a rotated coordinate system for which E is the north pole, the
-!    projection plane contains the equator, and only northern hemisphere
-!    points are visible (from the point at infinity in the direction E).
-!    These are projected orthogonally onto the projection plane (by zeroing
-!    the z-component in the rotated coordinate system).  ELAT and ELON must
-!    be in the range -90 to 90 and -180 to 180, respectively.
-!
-!    Input, real ( kind = 8 ) A, the angular distance in degrees from E to the
-!    boundary of a circular window against which the Voronoi diagram is clipped.
-!    The projected window is a disk of radius R = Sin(A) centered at the
-!    origin, and only visible vertices whose projections are within distance
-!    R of the origin are included in the plot.  Thus, if A = 90, the plot
-!    includes the entire hemisphere centered at E.  0 < A <= 90.
-!
-!    Input, integer ( kind = 4 ) N, the number of nodes (Voronoi centers) and
-!    Voronoi regions.  3 <= N.
-!
-!    Input, real ( kind = 8 ) X(N), Y(N), Z(N), the coordinates of the nodes
-!    (unit vectors).
-!
-!    Input, integer ( kind = 4 ) NT, the number of Voronoi region vertices
-!    (triangles, including those in the extended triangulation if the number
-!    of boundary nodes NB is nonzero): NT = 2*N-4.
-!
-!    Input, integer ( kind = 4 ) LISTC(3*NT), containing triangle indexes
-!    (indexes to XC, YC, and ZC) stored in 1-1 correspondence with LIST/LPTR
-!    entries (or entries that would be stored in LIST for the extended
-!    triangulation): the index of triangle (N1,N2,N3) is stored in LISTC(K),
-!    LISTC(L), and LISTC(M), where LIST(K), LIST(L), and LIST(M) are the
-!    indexes of N2 as a neighbor of N1, N3 as a neighbor of N2, and N1 as a
-!    neighbor of N3.  The Voronoi region associated with a node is defined by
-!    the CCW-ordered sequence of circumcenters in one-to-one correspondence
-!    with its adjacency list (in the extended triangulation).
-!
-!    Input, integer ( kind = 4 ) LPTR(3*NT), where NT = 2*N-4, containing a
-!    set of pointers (LISTC indexes) in one-to-one correspondence with the
-!    elements of LISTC.  LISTC(LPTR(I)) indexes the triangle which follows
-!    LISTC(I) in cyclical counterclockwise order (the first neighbor follows
-!    the last neighbor).
-!
-!    Input, integer ( kind = 4 ) LEND(N), a set of pointers to triangle lists.
-!    LP = LEND(K) points to a triangle (indexed by LISTC(LP)) containing node
-!    K for K = 1 to N.
-!
-!    Input, real ( kind = 8 ) XC(NT), YC(NT), ZC(NT), the coordinates of the
-!    triangle circumcenters (Voronoi vertices).
-!    XC(I)**2 + YC(I)**2 + ZC(I)**2 = 1.
-!
-!    Input, character ( len = * ) TITLE, a string to be centered above the plot.
-!    The string must be enclosed in parentheses; i.e., the first and last
-!    characters must be '(' and ')', respectively, but these are not
-!    displayed.  TITLE may have at most 80 characters including the parentheses.
-!
-!    Input, logical NUMBR, option indicator:  If NUMBR = TRUE, the nodal
-!    indexes are plotted at the Voronoi region centers.
-!
-!    Output, integer ( kind = 4 ) IER = Error indicator:
-!    0, if no errors were encountered.
-!    1, if LUN, PLTSIZ, N, or NT is outside its valid range.
-!    2, if ELAT, ELON, or A is outside its valid range.
-!    3, if an error was encountered in writing to unit LUN.
-!
-!  Local parameters:
-!
-!    ANNOT =     Logical variable with value TRUE iff the plot
-!                is to be annotated with the values of ELAT, ELON, and A
-!    CF =        Conversion factor for degrees to radians
-!    CT =        Cos(ELAT)
-!    EX,EY,EZ =  Cartesian coordinates of the eye-position E
-!    FSIZN =     Font size in points for labeling nodes with
-!                their indexes if NUMBR = TRUE
-!    FSIZT =     Font size in points for the title (and
-!                annotation if ANNOT = TRUE)
-!    IN1,IN2 =   Logical variables with value TRUE iff the
-!                projections of vertices KV1 and KV2, respec-
-!                tively, are inside the window
-!    IPX1,IPY1 = X and y coordinates (in points) of the lower
-!                left corner of the bounding box or viewport box
-!    IPX2,IPY2 = X and y coordinates (in points) of the upper
-!                right corner of the bounding box or viewport box
-!    IR =        Half the width (height) of the bounding box or
-!                viewport box in points -- viewport radius
-!    KV1,KV2 =   Endpoint indexes of a Voronoi edge
-!    LP =        LIST index (pointer)
-!    LPL =       Pointer to the last neighbor of N0
-!    N0 =        Index of a node
-!    R11...R23 = Components of the first two rows of a rotation
-!                that maps E to the north pole (0,0,1)
-!    SF =        Scale factor for mapping world coordinates
-!                (window coordinates in [-WR,WR] X [-WR,WR])
-!                to viewport coordinates in [IPX1,IPX2] X [IPY1,IPY2]
-!    T =         Temporary variable
-!    TX,TY =     Translation vector for mapping world coordi-
-!                nates to viewport coordinates
-!    WR =        Window radius r = Sin(A)
-!    WRS =       WR**2
-!    X0,Y0 =     Projection plane coordinates of node N0 or label location
-!    X1,Y1,Z1 =  Coordinates of vertex KV1 in the rotated coordinate system
-!    X2,Y2,Z2 =  Coordinates of vertex KV2 in the rotated
-!                coordinate system or intersection of edge
-!                KV1-KV2 with the equator (in the rotated coordinate system)
-!
-  implicit none
-
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) nt
-
-  real    ( kind = 8 ) a
-  logical, parameter :: annot = .true.
-  real    ( kind = 8 ) cf
-  real    ( kind = 8 ) ct
-  real    ( kind = 8 ) elat
-  real    ( kind = 8 ) elon
-  real    ( kind = 8 ) ex
-  real    ( kind = 8 ) ey
-  real    ( kind = 8 ) ez
-  real    ( kind = 8 ), parameter :: fsizn = 10.0D+00
-  real    ( kind = 8 ), parameter :: fsizt = 16.0D+00
-  integer ( kind = 4 ) ier
-  logical in1
-  logical in2
-  integer ( kind = 4 ) ipx1
-  integer ( kind = 4 ) ipx2
-  integer ( kind = 4 ) ipy1
-  integer ( kind = 4 ) ipy2
-  integer ( kind = 4 ) ir
-  integer ( kind = 4 ) kv1
-  integer ( kind = 4 ) kv2
-  integer ( kind = 4 ) lend(n)
-  integer ( kind = 4 ) listc(3*nt)
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ) lptr(6*(n-2))
-  integer ( kind = 4 ) lun
-  integer ( kind = 4 ) n0
-  logical              numbr
-  real    ( kind = 8 ) pltsiz
-  real    ( kind = 8 ) r11
-  real    ( kind = 8 ) r12
-  real    ( kind = 8 ) r21
-  real    ( kind = 8 ) r22
-  real    ( kind = 8 ) r23
-  real    ( kind = 8 ) sf
-  real    ( kind = 8 ) t
-  character ( len = * ) title
-  real    ( kind = 8 ) tx
-  real    ( kind = 8 ) ty
-  real    ( kind = 8 ) wr
-  real    ( kind = 8 ) wrs
-  real    ( kind = 8 ) x(n)
-  real    ( kind = 8 ) x0
-  real    ( kind = 8 ) x1
-  real    ( kind = 8 ) x2
-  real    ( kind = 8 ) xc(nt)
-  real    ( kind = 8 ) y(n)
-  real    ( kind = 8 ) y0
-  real    ( kind = 8 ) y1
-  real    ( kind = 8 ) y2
-  real    ( kind = 8 ) yc(nt)
-  real    ( kind = 8 ) z(n)
-  real    ( kind = 8 ) z1
-  real    ( kind = 8 ) z2
-  real    ( kind = 8 ) zc(nt)
-
-  ier = 0
-!
-!  Test for invalid parameters.
-!
-  if ( lun < 0 ) then
-    ier = 1
-    return
-  end if
-
-  if ( 99 < lun ) then
-    ier = 1
-    return
-  end if
-
-  if ( pltsiz < 1.0D+00 .or. 8.5D+00 < pltsiz .or. &
-      n < 3 .or. nt /= 2*n-4) then
-    ier = 1
-    return
-  end if
-
-  if ( 90.0D+00 < abs ( elat ) .or. &
-       180.0D+00 < abs ( elon ) .or. &
-       90.0D+00 < a ) then
-    ier = 2
-    return
-  end if
-!
-!  Compute a conversion factor CF for degrees to radians.
-!
-  cf = atan ( 1.0D+00 ) / 45.0D+00
-!
-!  Compute the window radius WR.
-!
-  wr = sin ( cf * a )
-  wrs = wr * wr
-!
-!  Compute the lower left (IPX1,IPY1) and upper right
-!  (IPX2,IPY2) corner coordinates of the bounding box.
-!  The coordinates, specified in default user space units
-!  (points, at 72 points/inch with origin at the lower
-!  left corner of the page), are chosen to preserve the
-!  square aspect ratio, and to center the plot on the 8.5
-!  by 11 inch page.  The center of the page is (306,396),
-!  and IR = PLTSIZ/2 in points.
-!
-  ir = nint ( 36.0D+00 * pltsiz )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Output header comments.
-!
-  write ( lun, '(a)' ) '%!ps-adobe-3.0 epsf-3.0'
-  write ( lun, '(a,4i4)' ) '%%BoundingBox: ', ipx1, ipy1, ipx2, ipy2
-  write ( lun, '(a)' ) '%%title:  Voronoi diagram'
-  write ( lun, '(a)' ) '%%creator:  STRIPACK.F90'
-  write ( lun, '(a)' ) '%%endcomments'
-!
-!  Set (IPX1,IPY1) and (IPX2,IPY2) to the corner coordinates
-!  of a viewport box obtained by shrinking the bounding box
-!  by 12% in each dimension.
-!
-  ir = nint ( 0.88D+00 * real ( ir, kind = 8 ) )
-  ipx1 = 306 - ir
-  ipx2 = 306 + ir
-  ipy1 = 396 - ir
-  ipy2 = 396 + ir
-!
-!  Set the line thickness to 2 points, and draw the viewport boundary.
-!
-  t = 2.0D+00
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-  write ( lun, '(a,i3,a)' ) '306 396 ', ir, ' 0 360 arc'
-  write ( lun, '(a)' ) 'stroke'
-!
-!  Set up an affine mapping from the window box [-WR,WR] X
-!  [-WR,WR] to the viewport box.
-!
-  sf = real ( ir, kind = 8 ) / wr
-  tx = ipx1 + sf * wr
-  ty = ipy1 + sf * wr
-
-  write ( lun, '(2f12.6,a)' ) tx, ty, ' translate'
-  write ( lun, '(2f12.6,a)' ) sf, sf, ' scale'
-!
-!  The line thickness must be changed to reflect the new
-!  scaling which is applied to all subsequent output.
-!  Set it to 1.0 point.
-!
-  t = 1.0D+00 / sf
-  write ( lun, '(f12.6,a)' ) t, ' setlinewidth'
-!
-!  Save the current graphics state, and set the clip path to
-!  the boundary of the window.
-!
-  write ( lun, '(a)' ) 'gsave'
-  write ( lun, '(a,f12.6,a)' ) '0 0 ', wr, ' 0 360 arc'
-  write ( lun, '(a)' ) 'clip newpath'
-!
-!  Compute the Cartesian coordinates of E and the components
-!  of a rotation R which maps E to the north pole (0,0,1).
-!  R is taken to be a rotation about the z-axis (into the
-!  yz-plane) followed by a rotation about the x-axis chosen
-!  so that the view-up direction is (0,0,1), or (-1,0,0) if
-!  E is the north or south pole.
-!
-!           ( R11  R12  0   )
-!       R = ( R21  R22  R23 )
-!           ( EX   EY   EZ  )
-!
-  t = cf * elon
-  ct = cos ( cf * elat )
-  ex = ct * cos ( t )
-  ey = ct * sin ( t )
-  ez = sin ( cf * elat )
-
-  if ( ct /= 0.0D+00 ) then
-    r11 = -ey / ct
-    r12 = ex / ct
-  else
-    r11 = 0.0D+00
-    r12 = 1.0D+00
-  end if
-
-  r21 = -ez * r12
-  r22 = ez * r11
-  r23 = ct
-!
-!  Loop on nodes (Voronoi centers) N0.
-!  LPL indexes the last neighbor of N0.
-!
-  do n0 = 1, n
-
-    lpl = lend(n0)
-!
-!  Set KV2 to the first (and last) vertex index and compute
-!  its coordinates (X2,Y2,Z2) in the rotated coordinate system.
-!
-    kv2 = listc(lpl)
-    x2 = r11 * xc(kv2) + r12 * yc(kv2)
-    y2 = r21 * xc(kv2) + r22 * yc(kv2) + r23 * zc(kv2)
-    z2 = ex * xc(kv2) + ey * yc(kv2) + ez * zc(kv2)
-!
-!  IN2 = TRUE iff KV2 is in the window.
-!
-    in2 = ( 0.0D+00 <= z2 ) .and. ( x2 * x2 + y2 * y2 <= wrs )
-!
-!  Loop on neighbors N1 of N0.  For each triangulation edge
-!  N0-N1, KV1-KV2 is the corresponding Voronoi edge.
-!
-    lp = lpl
-
-    do
-
-      lp = lptr(lp)
-      kv1 = kv2
-      x1 = x2
-      y1 = y2
-      z1 = z2
-      in1 = in2
-      kv2 = listc(lp)
-!
-!  Compute the new values of (X2,Y2,Z2) and IN2.
-!
-      x2 = r11 * xc(kv2) + r12 * yc(kv2)
-      y2 = r21 * xc(kv2) + r22 * yc(kv2) + r23 * zc(kv2)
-      z2 = ex * xc(kv2) + ey * yc(kv2) + ez * zc(kv2)
-      in2 = 0.0D+00 <= z2 .and. x2 * x2 + y2 * y2 <= wrs
-!
-!  Add edge KV1-KV2 to the path iff both endpoints are inside
-!  the window and KV1 < KV2, or KV1 is inside and KV2 is
-!  outside (so that the edge is drawn only once).
-!
-      if ( in1 .and. ( .not. in2 .or. kv1 < kv2 ) ) then
-!
-!  If KV2 is a 'southern hemisphere' point, move it to the
-!  intersection of edge KV1-KV2 with the equator so that
-!  the edge is clipped properly.  Z2 is implicitly set to 0.
-!
-        if ( z2 < 0.0D+00 ) then
-          x2 = z1 * x2 - z2 * x1
-          y2 = z1 * y2 - z2 * y1
-          t = sqrt ( x2 * x2 + y2 * y2 )
-          x2 = x2 / t
-          y2 = y2 / t
-        end if
-
-        write ( lun, '(2f12.6,a,2f12.6,a)' ) &
-          x1, y1, ' moveto', x2, y2, ' lineto'
-
-      end if
-
-      if ( lp == lpl ) then
-        exit
-      end if
-
-    end do
-
-  end do
-!
-!  Paint the path and restore the saved graphics state (with no clip path).
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'grestore'
-
-  if ( numbr ) then
-!
-!  Nodes in the window are to be labeled with their indexes.
-!  Convert FSIZN from points to world coordinates, and
-!  output the commands to select a font and scale it.
-!
-    t = fsizn / sf
-    write ( lun, '(a)' ) '/Helvetica findfont'
-    write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Loop on visible nodes N0 that project to points (X0,Y0) in
-!  the window.
-!
-    do n0 = 1, n
-
-      if ( ex * x(n0) + ey * y(n0) + ez * z(n0) < 0.0D+00 ) then
-        cycle
-      end if
-
-      x0 = r11 * x(n0) + r12 * y(n0)
-      y0 = r21 * x(n0) + r22 * y(n0) + r23 * z(n0)
-!
-!  Move to (X0,Y0), and draw the label N0 with the origin
-!  of the first character at (X0,Y0).
-!
-      if ( x0 * x0 + y0 * y0 <= wrs ) then
-        write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-        write ( lun, '(a,i3,a)' ) '(', n0, ') show'
-      end if
-
-    end do
-
-  end if
-!
-!  Convert FSIZT from points to world coordinates, and output
-!  the commands to select a font and scale it.
-!
-  t = fsizt / sf
-  write ( lun, '(a)' ) '/Helvetica findfont'
-  write ( lun, '(f12.6,a)' ) t, ' scalefont setfont'
-!
-!  Display TITLE centered above the plot:
-!
-  y0 = wr + 3.0D+00 * t
-  write ( lun, '(a)' ) title
-  write ( lun, '(a,g12.6,a)' ) '  stringwidth pop 2 div neg ', y0, ' moveto'
-  write ( lun, '(a)' ) title
-  write ( lun, '(a)' ) '  show'
-!
-!  Display the window center and radius below the plot.
-!
-  if ( annot ) then
-
-    x0 = -wr
-    y0 = -wr - 50.0D+00 / sf
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f7.2,a,f8.2,a)' ) '(Window center:  Latitude = ', elat, &
-      ', Longitude = ', elon , ') show'
-    y0 = y0 - 2.0D+00 * t
-    write ( lun, '(2f12.6,a)' ) x0, y0, ' moveto'
-    write ( lun, '(a,f5.2,a)' ) '(Angular extent = ', a, ') show'
-
-  end if
-!
-!  Paint the path and output the showpage command and end-of-file indicator.
-!
-  write ( lun, '(a)' ) 'stroke'
-  write ( lun, '(a)' ) 'showpage'
-  write ( lun, '(a)' ) '%%eof'
-
-  return
-end
diff --git a/sandbox/stripack/stripack.h.LB b/sandbox/stripack/stripack.h.LB
deleted file mode 100644
index f40d433..0000000
--- a/sandbox/stripack/stripack.h.LB
+++ /dev/null
@@ -1,36 +0,0 @@
-/****************************************************************************
- *
- * stripack.h                                               Laurent Bartholdi
- *
- *   @(#)$Id: stripack.h,v 1.2 2011/03/25 21:54:56 gap Exp $
- *
- * Copyright (C) 2010, Laurent Bartholdi
- *
- ****************************************************************************
- *
- * header / type declarations for STRIPACK package
- *
- ****************************************************************************/
-
-typedef double Fdouble; /* F90 real(kind=10) */
-
-void trmesh_ (Int4 *n, Fdouble *x, Fdouble *y, Fdouble *z,
-	     Int4 *list, Int4 *lptr, Int4 *lend, Int4 *lnew,
-	     Int4 *__near, Int4 *__next, Fdouble *__dist, Int4 *ier);
-
-void crlist_ (Int4 *n, Int4 *ncol, Fdouble *x, Fdouble *y, Fdouble *z,
-	      Int4 *list, Int4 *lptr, Int4 *lend, Int4 *lnew,
-	      Int4 *__ltri, Int4 *__listc, Int4 *nb,
-	      Fdouble *xc, Fdouble *yc, Fdouble *zc, Fdouble *rc, Int4 *ier);
-
-void trfind_ (Int4 *nst, Fdouble *p, Int4 *n, Fdouble *x, Fdouble *y, Fdouble *z,
-	      Int4 *list, Int4 *lptr, Int4 *lend,
-	      Fdouble *b1, Fdouble *b2, Fdouble *b3, Int4 *i1, Int4 *i2, Int4 *i3);
-
-void bnodes_ (Int4 *n, Int4 *list, Int4 *lptr, Int4 *lend, Int4 *nodes,
-	      Int4 *nb, Int4 *na, Int4 *nt);
-
-void addnod_ (Int4 *nst, Int4 *k, Fdouble *x, Fdouble *y, Fdouble *z,
-	      Int4 *list, Int4 *lptr, Int4 *lend, Int4 *lnew, Int4 *ier);
-
-/* stripack.h . . . . . . . . . . . . . . . . . . . . . . . . . . ends here */
diff --git a/sandbox/stripack/stripack.o b/sandbox/stripack/stripack.o
deleted file mode 100644
index 0c03422..0000000
Binary files a/sandbox/stripack/stripack.o and /dev/null differ
diff --git a/sandbox/stripack/stripack_prb.csh b/sandbox/stripack/stripack_prb.csh
deleted file mode 100644
index 88b4bc2..0000000
--- a/sandbox/stripack/stripack_prb.csh
+++ /dev/null
@@ -1,35 +0,0 @@
-#!/bin/csh
-#
-F90 -c -g stripack_prb.f90 >& compiler.txt
-if ( $status != 0 ) then
-  echo "Errors compiling stripack_prb.f90"
-  exit
-endif
-rm compiler.txt
-#
-F90 stripack_prb.o -L$HOME/lib/$ARCH -lstripack
-if ( $status != 0 ) then
-  echo "Errors linking and loading stripack_prb.o"
-  exit
-endif
-rm stripack_prb.o
-#
-mv a.out stripack_prb
-./stripack_prb > stripack_prb_output.txt
-if ( $status != 0 ) then
-  echo "Errors running stripack_prb"
-  exit
-endif
-rm stripack_prb
-#
-if ( -e stripack_prb_del.eps ) then
-  convert stripack_prb_del.eps stripack_prb_del.png
-  rm stripack_prb_del.eps
-endif
-#
-if ( -e stripack_prb_vor.eps ) then
-  convert stripack_prb_vor.eps stripack_prb_vor.png
-  rm stripack_prb_vor.eps
-endif
-#
-echo "Program output written to stripack_prb_output.txt"
diff --git a/sandbox/stripack/stripack_prb.f90 b/sandbox/stripack/stripack_prb.f90
deleted file mode 100644
index c7374cf..0000000
--- a/sandbox/stripack/stripack_prb.f90
+++ /dev/null
@@ -1,650 +0,0 @@
-program main
-
-!*****************************************************************************80
-!
-!! MAIN is the main program for STRIPACK_PRB.
-!
-!  Discussion:
-!
-!    STRIPACK_PRB is a test routine for STRIPACK.
-!
-!  Modified:
-!
-!    25 February 2007
-!
-  implicit none
-
-  call timestamp ( )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'STRIPACK_PRB'
-  write ( *, '(a)' ) '  FORTRAN90 version'
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Test the routines in the STRIPACK library.'
-
-  call test01
-  call test02
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'STRIPACK_PRB'
-  write ( *, '(a)' ) '  Normal end of execution.'
-
-  write ( *, '(a)' ) ' '
-  call timestamp ( )
-
-  stop
-end
-subroutine test01
-
-!*****************************************************************************80
-!
-!! TEST01 is a test for STRIPACK.
-!
-!  Discussion:
-!
-!    This driver tests software package STRIPACK for constructing a 
-!    Delaunay triangulation and Voronoi diagram of a set of nodes on 
-!    the surface of the unit sphere.
-!
-!    All STRIPACK subprograms are tested.
-!
-!    By default, a triangulation is created from a set of N nodes consisting 
-!    of the north pole and N-1 points uniformly distributed around the 
-!    60-degree parallel (with constant longitudinal separation).  
-!
-!    The data is stored as RLAT(I), RLON(I), which are the nodal coordinates 
-!    in degrees latitude (-90 to 90) and degrees longitude (-180 to 180).
-!
-!  Modified:
-!
-!    25 February 2007
-!
-  implicit none
-
-  integer ( kind = 4 ), parameter :: nmax = 200
-  integer ( kind = 4 ), parameter :: nrow = 9
-
-  real    ( kind = 8 ) a
-  real    ( kind = 8 ) al
-  real    ( kind = 8 ) area
-  real    ( kind = 8 ) areas
-  real    ( kind = 8 ) ds(nmax)
-  real    ( kind = 8 ) elat
-  real    ( kind = 8 ) elon
-  integer ( kind = 4 ) i
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) iflag
-  logical inside
-  integer ( kind = 4 ) iwk(2*nmax)
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) ksum
-  integer ( kind = 4 ) kt
-  integer ( kind = 4 ) lbtri(6,nmax)
-  integer ( kind = 4 ) lend(nmax)
-  integer ( kind = 4 ) list(6*nmax)
-  integer ( kind = 4 ) listc(6*nmax)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lp
-  integer ( kind = 4 ) lpl
-  integer ( kind = 4 ), parameter :: lplt = 3
-  integer ( kind = 4 ), parameter :: lplv = 4
-  integer ( kind = 4 ) lptr(6*nmax)
-  integer ( kind = 4 ) ltri(nrow,2*nmax-4)
-  integer ( kind = 4 ) lwk
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) n0
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) n3
-  integer ( kind = 4 ) na
-  integer ( kind = 4 ) nb
-  integer ( kind = 4 ) nearnd
-  integer ( kind = 4 ) nn
-  integer ( kind = 4 ) nt
-  logical numbr
-  integer ( kind = 4 ) nv
-  real    ( kind = 8 ) p(3)
-  real    ( kind = 8 ), parameter :: pltsiz = 7.5D+00
-  real    ( kind = 8 ) rc(2*nmax-4)
-  real    ( kind = 8 ) rlat(nmax)
-  real    ( kind = 8 ) rlon(nmax)
-  real    ( kind = 8 ) sc
-  character ( len = 80 ) trplot_file_name
-  character ( len = 80 ) trplot_title
-  real    ( kind = 8 ) v1(3)
-  real    ( kind = 8 ) v2(3)
-  real    ( kind = 8 ) v3(3)
-  real    ( kind = 8 ) vlat
-  real    ( kind = 8 ) vlon
-  real    ( kind = 8 ) vnrm
-  character ( len = 80 ) vrplot_file_name
-  character ( len = 80 ) vrplot_title
-  real    ( kind = 8 ) x(nmax)
-  real    ( kind = 8 ) xc(2*nmax-4)
-  real    ( kind = 8 ) y(nmax)
-  real    ( kind = 8 ) yc(2*nmax-4)
-  real    ( kind = 8 ) z(nmax)
-  real    ( kind = 8 ) zc(2*nmax-4)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST01'
-  write ( *, '(a)' ) '  TRANS converts Cartesian to spherical coordinates.'
-  write ( *, '(a)' ) '  TRMESH creates a triangulation.'
-  write ( *, '(a)' ) '  TRPRNT prints out a triangulation.'
-  write ( *, '(a)' ) '  TRLIST creates a triangle list.'
-  write ( *, '(a)' ) '  TRLPRT prints a triangle list.'
-  write ( *, '(a)' ) '  TRPLOT plots a triangulation.'
-  write ( *, '(a)' ) '  AREAS computes areas.'
-  write ( *, '(a)' ) '  BNODES computes boundary nodes.'
-  write ( *, '(a)' ) '  GETNP gets the next nearest node to a given node.'
-  write ( *, '(a)' ) '  NEARND returns the nearest node to a given point.'
-  write ( *, '(a)' ) '  DELARC removes a boundary arc if possible.'
-  write ( *, '(a)' ) '  CRLIST constructs the Voronoi diagram.'
-  write ( *, '(a)' ) '  VRPLOT plots the Voronoi diagram.'
-  write ( *, '(a)' ) '  SCOORD prints the Voronoi region boundary associated'
-  write ( *, '(a)' ) '    with a point.'
-  write ( *, '(a)' ) '  INSIDE determines if a point is inside a '
-  write ( *, '(a)' ) '    Voronoi region.'
-!
-!  Generate the default set of nodes as latitudinal and longitudinal
-!  coordinates. 
-!
-  n = 100
-
-  call random_number ( harvest = rlat(1:n) )
-  call random_number ( harvest = rlon(1:n) )
-
-  rlat(1:n) = ( ( 1.0D+00 - rlat(1:n) ) * (  -90.0D+00 ) &
-              +             rlat(1:n)   *     90.0D+00 )
-
-  rlon(1:n) = ( ( 1.0D+00 - rlon(1:n) ) * ( -180.0D+00 ) &
-              +             rlon(1:n)   *    180.0D+00 )
-
-  if ( n < 3 .or. nmax < n ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Fatal error!'
-    write ( *, '(a)' ) '  The value of N is illegal.'
-    write ( *, '(a,i8,a)' ) '  3 <= N <= NMAX = ', nmax, ' is required.'
-    write ( *, '(a,i8)' ) '  Input N = ', n
-    stop
-  end if
-!
-!  Set X and Y to the values of RLON and RLAT, respectively,
-!  in radians.  (RLON and RLAT are saved for printing by TRPRNT).
-!
-  sc = atan ( 1.0D+00 ) / 45.0D+00
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  I     RLON     RLAT'
-  write ( *, '(a)' ) ' '
-  do i = 1, 5
-    write ( *, '(2x,i8,2x,f10.6,2x,f10.6)' ) i, rlon(i), rlat(i)
-  end do
-
-  x(1:n) = sc * rlon(1:n)
-  y(1:n) = sc * rlat(1:n)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  I     X     Y'
-  write ( *, '(a)' ) ' '
-  do i = 1, 5
-    write ( *, '(2x,i8,2x,f10.6,2x,f10.6)' ) i, x(i), y(i)
-  end do
-!
-!  Transform spherical coordinates X and Y to Cartesian
-!  coordinates (X,Y,Z) on the unit sphere (X**2 + Y**2 + Z**2 = 1).
-!
-  call trans ( n, y, x, x, y, z )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  I     X     Y     Z'
-  write ( *, '(a)' ) ' '
-  do i = 1, 5
-    write ( *, '(2x,i8,2x,f10.6,2x,f10.6,2x,f10.6)' ) i, x(i), y(i), z(i)
-  end do
-!
-!  Create the triangulation.
-!
-  call trmesh ( n, x, y, z, list, lptr, lend, lnew, iwk, iwk(n+1), ds, ier )
-
-  if ( ier == -2 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Warning!'
-    write ( *, '(a)' ) '  Error in TRMESH.'
-    write ( *, '(a)' ) '  The first three nodes are collinear.'
-    stop
-  end if
-
-  if ( 0 < ier ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Fatal error!'
-    write ( *, '(a)' ) '  Error in TRMESH.'
-    write ( *, '(a)' ) '  Duplicate nodes encountered.'
-    stop
-  end if
-!
-!  Print the spherical coordinates and adjacency information.
-!
-!  0 < IFLAG indicates that RLON and RLAT only are to be printed.
-!
-  iflag = 1
-
-  call trprnt ( n, rlon, rlat, z, iflag, list, lptr, lend )
-!
-!  Test TRLIST and TRLPRT by creating and printing a triangle list.
-!
-  call trlist ( n, list, lptr, lend, nrow, nt, ltri, ier )
-
-  call trlprt ( n, rlon, rlat, z, iflag, nrow, nt, ltri )
-!
-!  Test TRPLOT by plotting the portion of the triangulation contained 
-!  in the hemisphere centered at E = (ELAT,ELON), where ELAT and ELON
-!  are taken to be the center of the range of
-!  the nodal latitudes and longitudes.
-!
-  elat = minval ( rlat(1:n) )
-  vlat = maxval ( rlat(1:n) )
-  elon = minval ( rlon(1:n) )
-  vlon = maxval ( rlon(1:n) )
-
-  elat = ( elat + vlat ) / 2.0D+00
-  elon = ( elon + vlon ) / 2.0D+00
-  a = 90.0D+00
-  numbr = n <= 200
-
-  trplot_title = '(Triangulation created by STRIPACK_PRB)'
-
-  trplot_file_name = 'stripack_prb_del.eps'
-
-  open ( lplt, file = trplot_file_name )
-
-  call trplot ( lplt, pltsiz, elat, elon, a, n, x, y, z, list, &
-    lptr, lend, trplot_title, numbr, ier )
-
-  if ( ier == 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  TRPLOT created the triangulation plot file: "' // &
-      trim ( trplot_file_name ) // '".'
-  else
-    write ( *, '(a)' ) ' '
-    write ( *, '(a,i8)' ) '  TRPLOT returned error code ', ier
-  end if
-!
-!  Test AREAS by computing and printing the area of the
-!  convex hull of the nodes (sum of triangle
-!  areas) relative to the total surface area (4*Pi).
-!
-  area = 0.0D+00
-
-  do kt = 1, nt
-    n1 = ltri(1,kt)
-    n2 = ltri(2,kt)
-    n3 = ltri(3,kt)
-    v1(1) = x(n1)
-    v1(2) = y(n1)
-    v1(3) = z(n1)
-    v2(1) = x(n2)
-    v2(2) = y(n2)
-    v2(3) = z(n2)
-    v3(1) = x(n3)
-    v3(2) = y(n3)
-    v3(3) = z(n3)
-    area = area + areas ( v1, v2, v3 )
-  end do
-
-  area = area / ( 16.0D+00 * atan ( 1.0D+00 ) )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,f8.2)' ) '  Relative area of convex hull = ', area
-!
-!  Test BNODES.  The ordered sequence of boundary nodes is stored in IWK.
-!
-  call bnodes ( n, list, lptr, lend, iwk, nb, na, nt )
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  Output from BNODES:'
-  write ( *, '(a,i8)' ) '  Number of boundary nodes = ', nb
-  write ( *, '(a,i8)' ) '  Number of arcs =           ', na
-  write ( *, '(a,i8)' ) '  Number of triangles =      ', nt
-!
-!  Test GETNP by ordering the nodes on distance from N0 and verifying 
-!  the ordering.  
-!
-!  The sequence of nodal indexes is stored in IWK, and the values of an
-!  increasing function (the negative cosine) of angular distance is
-!  stored in DS.
-!
-  n0 = n / 2
-  iwk(1) = n0
-  ds(1) = -1.0D+00
-  ksum = n0
-
-  do k = 2, n
-
-    call getnp ( x, y, z, list, lptr, lend, k, iwk, ds(k), ier )
-
-    if ( ier /= 0  .or.  ds(k) < ds(k-1) ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) 'TEST01 - Fatal error!'
-      write ( *, '(a)' ) '  Error in GETNP.'
-      stop
-    end if
-
-    ksum = ksum + iwk(k)
-
-  end do
-!
-!  Test for all nodal indexes included in IWK.
-!
-  if ( ksum /= ( n * ( n + 1 ) ) / 2 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Fatal error!'
-    write ( *, '(a)' ) '  Error in GETNP.'
-    stop
-  end if
-!
-!  Test NEARND by verifying that the nearest node to K is
-!  node K for K = 1 to N.
-!
-  do k = 1, n
-
-    p(1) = x(k)
-    p(2) = y(k)
-    p(3) = z(k)
-
-    n0 = nearnd ( p, 1, n, x, y, z, list, lptr, lend, al )
-
-    if ( n0 /= k .or. 0.001D+00 < al ) then
-      write ( *, '(a)' ) ' '
-      write ( *, '(a)' ) 'TEST01 - Fatal error!'
-      write ( *, '(a)' ) '  Error in NEARND.'
-      stop
-    end if
-
-  end do
-!
-!  Test DELARC by removing a boundary arc if possible.
-!  The last two nodes define a boundary arc
-!  in the default data set.
-!
-  n1 = n - 1
-  n2 = n
-  call delarc ( n, n1, n2, list, lptr, lend, lnew, ier )
-
-  if ( ier == 1  .or.  ier == 4 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Warning!'
-    write ( *, '(a,i8)' ) '  DELARC returned error code ', ier
-    stop
-  end if
-
-  if ( ier /= 0 ) then
-
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  Subroutine DELARC was not tested.'
-    write ( *, '(a,i8,a,i8,a)' ) '  Nodes ', n1, ' and ', n2, &
-      ' do not form a removable boundary arc.'
-  else
-
-    call trmesh ( n, x, y, z, list, lptr, lend, lnew, iwk, iwk(n+1), ds, &
-      ier )
-
-  end if
-!
-!  Test CRLIST, VRPLOT, and SCOORD by constructing and
-!  plotting the Voronoi diagram, and printing
-!  the Voronoi region boundary (ordered
-!  sequence of Voronoi vertices) associated with N0.
-!
-!  Note that the triangulation data structure
-!  is altered if 0 < NB.
-!
-  call crlist ( n, nmax, x, y, z, list, lend, lptr, lnew, &
-    lbtri, listc, nb, xc, yc, zc, rc, ier )
-
-  if ( ier /= 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Warning!'
-    write ( *, '(a,i8)' ) '  CRLIST returned error code ', ier
-    stop
-  end if
-!
-!  Use the same parameter values that were used for the
-!  triangulation plot (except the output unit and title).
-!
-  nt = 2 * n - 4
-
-  vrplot_file_name = 'stripack_prb_vor.eps'
-
-  vrplot_title = '(Voronoi diagram created by STRIPACK_PRB)'
-
-  open ( unit = lplv, file = vrplot_file_name )
-
-  call vrplot ( lplv, pltsiz, elat, elon, a, n, x, y, z, nt, listc, &
-    lptr, lend, xc, yc, zc, vrplot_title, numbr, ier )
-
-  if ( ier == 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) '  VRPLOT created the Voronoi plot file: "' // &
-      trim ( vrplot_file_name ) // '".'
-  else
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Warning!'
-    write ( *, '(a,i8)' ) '  VRPLOT returned error code ', ier
-  end if
-
-  n0 = 1
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a,i8)' ) '  Voronoi region for node ', n0
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '     Triangle     Latitude     Longitude' // &
-    '     Circumradius'
-  write ( *, '(a)' ) ' '
-!
-!  Initialize for loop on Voronoi vertices (triangle circumcenters).  
-!  The number of vertices is accumulated in NV, and the vertex indexes
-!  are stored in IWK.  The vertices are converted to latitude and longitude 
-!  in degrees for printing.
-!
-  nv = 0
-  lpl = lend(n0)
-  lp = lpl
-
-  do
-
-    lp = lptr(lp)
-    kt = listc(lp)
-    nv = nv + 1
-    iwk(nv) = kt
-    call scoord ( xc(kt), yc(kt), zc(kt), vlat, vlon, vnrm )
-    vlat = vlat / sc
-    vlon = vlon / sc
-    write ( *, '(i13,f13.6,f14.6,f17.6)' ) kt, vlat, vlon, rc(kt)
-
-    if ( lp == lpl ) then
-      exit
-    end if
-
-  end do
-!
-!  Test INSIDE by checking for node N0 inside its Voronoi region.
-!
-  p(1) = x(n0)
-  p(2) = y(n0)
-  p(3) = z(n0)
-
-  if ( .not. inside ( p, 2*nmax-4, xc, yc, zc, nv, iwk, ier ) ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Warning!'
-    write ( *, '(a)' ) '  Error in INSIDE.'
-    write ( *, '(a)' ) '  A node is not contained in its Voronoi region.'
-    write ( *, '(a,i8)' ) '  Node index = ', n0
-  end if
-
-  if ( ier /= 0 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST01 - Fatal error!'
-    write ( *, '(a)' ) '  Error in INSIDE.'
-    write ( *, '(a,i8)' ) '  IER = ', ier
-    stop
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  INSIDE correctly reports that node N0 is'
-  write ( *, '(a)' ) '  inside its Voronoi region!'
-
-  return
-end
-subroutine test02
-
-!*****************************************************************************80
-!
-!! TEST02 tests EDGE and DELNOD.
-!
-!  Modified:
-!
-!    16 June 2007
-!
-  implicit none
-
-  integer ( kind = 4 ), parameter :: nmax = 200
-
-  real    ( kind = 8 ) ds(nmax)
-  integer ( kind = 4 ) ier
-  integer ( kind = 4 ) iwk(2*nmax)
-  integer ( kind = 4 ) k
-  integer ( kind = 4 ) lend(nmax)
-  integer ( kind = 4 ) list(6*nmax)
-  integer ( kind = 4 ) listc(6*nmax)
-  integer ( kind = 4 ) lnew
-  integer ( kind = 4 ) lptr(6*nmax)
-  integer ( kind = 4 ) lwk
-  integer ( kind = 4 ) n
-  integer ( kind = 4 ) n1
-  integer ( kind = 4 ) n2
-  integer ( kind = 4 ) nn
-  real    ( kind = 8 ) rlat(nmax)
-  real    ( kind = 8 ) rlon(nmax)
-  real    ( kind = 8 ) sc
-  real    ( kind = 8 ) x(nmax)
-  real    ( kind = 8 ) y(nmax)
-  real    ( kind = 8 ) z(nmax)
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) 'TEST02'
-  write ( *, '(a)' ) '  EDGE can be used to force an edge between two nodes.'
-  write ( *, '(a)' ) '  DEL can be used to delete a node.'
-!
-!  Generate the default set of nodes as latitudinal and longitudinal
-!  coordinates. 
-!
-  n = 9
-
-  rlat(1) = 90.0D+00
-  rlat(2:n) = 60.0D+00
-
-  rlon(1) = 0.0D+00
-  do k = 2, n
-    rlon(k) = real ( k - 2, kind = 8 ) * 360.0D+00 / real ( n - 1, kind = 8 )
-  end do
-
-  if ( n < 3 .or. nmax < n ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST02 - Fatal error!'
-    write ( *, '(a)' ) '  The value of N is illegal.'
-    write ( *, '(a,i8,a)' ) '  3 <= N <= NMAX = ', nmax, ' is required.'
-    write ( *, '(a,i8)' ) '  Input N = ', n
-    stop
-  end if
-!
-!  Set X and Y to the values of RLON and RLAT, respectively,
-!  in radians.  (RLON and RLAT are saved for printing by TRPRNT).
-!
-  sc = atan ( 1.0D+00 ) / 45.0D+00
-
-  x(1:n) = sc * rlon(1:n)
-  y(1:n) = sc * rlat(1:n)
-!
-!  Transform spherical coordinates X and Y to Cartesian
-!  coordinates (X,Y,Z) on the unit sphere (X**2 + Y**2 + Z**2 = 1).
-!
-  call trans ( n, y, x, x, y, z )
-!
-!  Create the triangulation.
-!
-  call trmesh ( n, x, y, z, list, lptr, lend, lnew, iwk, iwk(n+1), ds, ier )
-
-  if ( ier == -2 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST02 - Warning!'
-    write ( *, '(a)' ) '  Error in TRMESH.'
-    write ( *, '(a)' ) '  The first three nodes are collinear.'
-    return
-  else if ( 0 < ier ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST02 - Fatal error!'
-    write ( *, '(a)' ) '  Error in TRMESH.'
-    write ( *, '(a)' ) '  Duplicate nodes encountered.'
-    return
-  end if
-!
-!  Test EDGE by forcing an edge between nodes N1=1 and N2=N. 
-!
-  n1 = 1
-  n2 = n
-
-  call edge ( n1, n2, x, y, z, nmax, iwk, list, lptr, lend, ier )
-
-  if ( ier /= 0 .and. ier /= 5 ) then
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST02 - Fatal error!'
-    write ( *, '(a)' ) '  Error in EDGE.'
-    write ( *, '(a,i8)' ) '  IER = ', ier
-    stop
-  end if
-
-  write ( *, '(a)' ) ' '
-  write ( *, '(a)' ) '  EDGE has forced an edge between two nodes.'
-!
-!  Test DELNOD by removing nodes 4 to N (in reverse order). 
-!
-  write ( *, '(a)' ) ' '
-
-  if ( n <= 3 ) then
-
-    write ( *, '(a)' ) ' '
-    write ( *, '(a)' ) 'TEST02:'
-    write ( *, '(a)' ) '  Subroutine DELNOD was not tested, because'
-    write ( *, '(a)' ) '  the number of nodes N is too small.'
-
-  else
-
-    nn = n
-    lwk = nmax
-
-    do
-
-      k = nn
-
-      write ( *, '(a,i8)' ) '  Call DELNOD to delete node ', k
-
-      call delnod ( k, nn, x, y, z, list, lptr, lend, lnew, lwk, iwk, ier )
-
-      if ( ier /= 0 .and. ier /= 5 ) then
-        write ( *, '(a)' ) ' '
-        write ( *, '(a)' ) 'TEST02 - Fatal error!'
-        write ( *, '(a,i8)' ) '  DELNOD returned IER = ', ier
-        stop
-      end if
-
-      if ( nn <= 3 ) then
-        exit
-      end if
-
-    end do
-
-  end if
-
-  return
-end
diff --git a/sandbox/stripack/stripack_prb_del.eps b/sandbox/stripack/stripack_prb_del.eps
deleted file mode 100644
index 032a54a..0000000
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-    0.156225    0.597832 moveto
-( 70) show
-    0.477446    0.831768 moveto
-( 71) show
-    0.313721   -0.910038 moveto
-( 76) show
-   -0.790991    0.505694 moveto
-( 81) show
-    0.460259    0.005279 moveto
-( 83) show
-   -0.231140   -0.971597 moveto
-( 85) show
-   -0.855675    0.150662 moveto
-( 87) show
-   -0.918501   -0.381723 moveto
-( 88) show
-    0.013900   -0.999164 moveto
-( 89) show
-    0.208477    0.791698 moveto
-( 90) show
-    0.234962   -0.938102 moveto
-( 94) show
-   -0.456813   -0.544880 moveto
-( 95) show
-/Helvetica findfont
-    0.067227 scalefont setfont
-(Triangulation created by STRIPACK_PRB)                                         
-  stringwidth pop 2 div neg     1.201681 moveto
-(Triangulation created by STRIPACK_PRB)                                         
-  show
-   -1.000000   -1.210084 moveto
-(Window center:  Latitude =    0.40, Longitude =    -0.87) show
-   -1.000000   -1.344538 moveto
-(Angular extent = 90.00) show
-stroke
-showpage
-%%eof
diff --git a/sandbox/stripack/stripack_prb_del.png b/sandbox/stripack/stripack_prb_del.png
deleted file mode 100644
index da9f981..0000000
Binary files a/sandbox/stripack/stripack_prb_del.png and /dev/null differ
diff --git a/sandbox/stripack/stripack_prb_output.txt b/sandbox/stripack/stripack_prb_output.txt
deleted file mode 100644
index ac64f6d..0000000
--- a/sandbox/stripack/stripack_prb_output.txt
+++ /dev/null
@@ -1,645 +0,0 @@
-July 21 2007  12:08:21.938 PM
- 
-STRIPACK_PRB
-  FORTRAN90 version
- 
-  Test the routines in the STRIPACK library.
- 
-TEST01
-  TRANS converts Cartesian to spherical coordinates.
-  TRMESH creates a triangulation.
-  TRPRNT prints out a triangulation.
-  TRLIST creates a triangle list.
-  TRLPRT prints a triangle list.
-  TRPLOT plots a triangulation.
-  AREAS computes areas.
-  BNODES computes boundary nodes.
-  GETNP gets the next nearest node to a given node.
-  NEARND returns the nearest node to a given point.
-  DELARC removes a boundary arc if possible.
-  CRLIST constructs the Voronoi diagram.
-  VRPLOT plots the Voronoi diagram.
-  SCOORD prints the Voronoi region boundary associated
-    with a point.
-  INSIDE determines if a point is inside a 
-    Voronoi region.
- 
-  I     RLON     RLAT
- 
-         1   21.122342   87.102062
-         2  139.613946   35.991132
-         3  143.552850  -40.443870
-         4   66.324136   28.998345
-         5  121.540238   55.771544
- 
-  I     X     Y
- 
-         1    0.368654    1.520218
-         2    2.436723    0.628164
-         3    2.505470   -0.705879
-         4    1.157575    0.506117
-         5    2.121277    0.973397
- 
-  I     X     Y     Z
- 
-         1    0.047160    0.018219    0.998721
-         2   -0.616294    0.524249    0.587660
-         3   -0.612186    0.452121   -0.648703
-         4    0.351220    0.801017    0.484784
-         5   -0.294239    0.479399    0.826801
-
-
-
-               STRIPACK triangulation data structure,  n =   100
-
-
- Node    Longitude      Latitude                  neighbors of node
-
-
-    1   0.211223E+02   0.871021E+02       56   83   68   88
- 
-    2   0.139614E+03   0.359911E+02       55   12   48   23   66   65   42
- 
-    3   0.143553E+03  -0.404439E+02       54   75   71   60   45   46
- 
-    4   0.663241E+02   0.289983E+02       82   21   53   96   77   17
- 
-    5   0.121540E+03   0.557715E+02       14    6  100   80   17   77   66
- 
-    6   0.111906E+03   0.738008E+02      100    5   14   94   28
- 
-    7  -0.324334E+02  -0.351967E+02       58   37   91   34   35   70   98   26
-                                          27   20
- 
-    8  -0.142740E+03  -0.283336E+01       87   59   22   78   11   71   86
- 
-    9   0.127606E+03   0.873706E+02       81   76   56   99   13
- 
-   10   0.864860E+02  -0.275172E+02       45   38   33   73   43
- 
-   11  -0.163744E+03   0.864229E+01       78   12   55   60   71    8
- 
-   12  -0.165187E+03   0.204824E+02       78   31   64   48    2   55   11
- 
-   13   0.147159E+03   0.848577E+02       99   28   94   39   81    9
- 
-   14   0.137440E+03   0.687496E+02       66   50   94    6    5
- 
-   15   0.449177E+02  -0.667815E+02       73   69   52   98   19   46   43
- 
-   16   0.112020E+02   0.772993E+02       57   72   62   80   88
- 
-   17   0.748834E+02   0.474197E+02       77    5   80   82    4
- 
-   18  -0.743588E+02   0.607811E+01       91   37   47   95   30
- 
-   19   0.341184E+02  -0.772043E+02       98   32   67   51   75   46   15
- 
-   20   0.232588E+02  -0.172647E+02       84   49   53   58    7   27
- 
-   21   0.968858E+01   0.415201E+02       72   74   24   58   53    4   82   62
-
-   22  -0.146812E+03   0.244241E+02       78    8   59   31
- 
-   23   0.173334E+03   0.682516E+02       94   61   66    2   48   39
- 
-   24  -0.403673E+02   0.340182E+02       74   85   47   29   58   21
- 
-   25  -0.132832E+03   0.514770E+02       93   95   85   90   48   64   31
- 
- 
- 
- 
-   26   0.643207E+00  -0.483685E+02       98   52   27    7
- 
-   27   0.432169E+01  -0.471638E+02       52   84   20    7   26
- 
-   28   0.125549E+03   0.811014E+02       99   88   80  100    6   94   13
- 
-   29  -0.436391E+02   0.218079E+02       47   37   58   24
- 
-   30  -0.800176E+02   0.507818E+01       95   87   86   36   97   34   91   18
-
-   31  -0.143136E+03   0.420014E+02       64   12   78   22   59   93   25
- 
-   32  -0.338979E+02  -0.794178E+02       98   70   79   67   19
- 
-   33   0.721551E+02  -0.613709E+01       38   96   49   69   73   10
- 
-   34  -0.645614E+02  -0.355907E+02       91   30   97   35    7
- 
-   35  -0.746421E+02  -0.523082E+02       97   92   70    7   34
- 
-   36  -0.124987E+03  -0.370872E+02       86   40   71   75   41   92   97   30
-
-   37  -0.494288E+02   0.176399E+02       47   18   91    7   58   29
- 
-   38   0.867377E+02  -0.699280E+01       10   45   65   77   96   33
- 
-   39  -0.164204E+03   0.739755E+02       48   90   81   13   94   23
- 
-   40  -0.133503E+03  -0.282445E+02       86   71   36
- 
-   41  -0.140171E+03  -0.775778E+02       92   36   75   51   63   44
- 
-   42   0.139266E+03   0.214907E+02       65   45   60   55    2
- 
-   43   0.860593E+02  -0.351287E+02       73   15   46   45   10
- 
-   44  -0.963578E+02  -0.841319E+02       63   67   79   70   92   41
- 
-   45   0.118057E+03  -0.110889E+02       10   43   46    3   60   42   65   38
-
-   46   0.111942E+03  -0.536276E+02       45   43   15   19   75   54    3
- 
-   47  -0.499320E+02   0.210595E+02       29   24   85   89   95   18   37
- 
-   48  -0.160732E+03   0.632352E+02       90   39   23    2   12   64   25
- 
-   49   0.459542E+02  -0.695919E+01       84   69   33   96   53   20
- 
-   50   0.144852E+03   0.694805E+02       66   61   94   14
- 
-   51  -0.173889E+03  -0.855112E+02       63   41   75   19   67
- 
-   52   0.109928E+02  -0.501828E+02       26   98   15   69   84   27
- 
-   53   0.169756E+02   0.663479E+01       49   96    4   21   58   20
- 
-   54   0.139697E+03  -0.554016E+02       46   75    3
- 
- 
- 
- 
-   55   0.143452E+03   0.278084E+02       60   11   12    2   42
- 
-   56   0.113432E+03   0.877142E+02       76   83    1   88   99    9
- 
-   57  -0.267235E+02   0.753294E+02       88   68   81   90   74   72   16
- 
-   58  -0.438373E+00   0.623304E+01       21   24   29   37    7   20   53
- 
-   59  -0.129822E+03   0.333480E+02       22    8   87   93   31
- 
-   60   0.155528E+03  -0.189092E+02       71   11   55   42   45    3
- 
-   61   0.149375E+03   0.695154E+02       66   23   94   50
- 
-   62   0.298943E+02   0.657977E+02       72   21   82   80   16
- 
-   63  -0.122286E+03  -0.842433E+02       41   51   67   44
- 
-   64  -0.147499E+03   0.516615E+02       48   12   31   25
- 
-   65   0.107345E+03   0.555208E+01       45   42    2   66   77   38
- 
-   66   0.130414E+03   0.473541E+02       77   65    2   23   61   50   14    5
-
-   67  -0.936835E+02  -0.860002E+02       63   51   19   32   79   44
- 
-   68  -0.320601E+02   0.874180E+02       83   81   57   88    1
- 
-   69   0.521500E+02  -0.299845E+02       84   52   15   73   33   49
- 
-   70  -0.782874E+02  -0.661765E+02       92   44   79   32   98    7   35
- 
-   71  -0.175709E+03  -0.199219E+02        3   75   36   40   86    8   11   60
-
-   72   0.234922E+02   0.667855E+02       16   57   74   21   62
- 
-   73   0.658562E+02  -0.323476E+02       15   43   10   33   69
- 
-   74  -0.309081E+02   0.602420E+02       90   85   24   21   72   57
- 
-   75   0.157367E+03  -0.685929E+02       46   19   51   41   36   71    3   54
-
-   76   0.120732E+03   0.879047E+02        9   81   83   56
- 
-   77   0.850219E+02   0.270780E+02       96   38   65   66    5   17    4
- 
-   78  -0.147635E+03   0.237313E+02       31   12   11    8   22
- 
-   79  -0.505542E+02  -0.788055E+02       70   44   67   32
- 
-   80   0.665294E+02   0.699968E+02       82   17    5  100   28   88   16   62
-
-   81  -0.546884E+02   0.868637E+02       83   76    9   13   39   90   57   68
-
-   82   0.426467E+02   0.570777E+02       21    4   17   80   62
- 
-   83   0.139195E+02   0.892081E+02        1   56   76   81   68
- 
- 
- 
- 
-   84   0.269261E+02  -0.204594E+02       27   52   69   49   20
- 
-   85  -0.675344E+02   0.355200E+02       24   74   90   25   95   89   47
- 
-   86  -0.136401E+03  -0.125803E+02       71   40   36   30   87    8
- 
-   87  -0.953961E+02   0.187796E+02       95   93   59    8   86   30
- 
-   88   0.239845E+02   0.821346E+02       68   57   16   80   28   99   56    1
-
-   89  -0.710667E+02   0.313203E+02       95   47   85
- 
-   90  -0.948251E+02   0.734196E+02       81   39   48   25   85   74   57
- 
-   91  -0.592951E+02  -0.745010E+01       30   34    7   37   18
- 
-   92  -0.911198E+02  -0.655060E+02       35   97   36   41   44   70
- 
-   93  -0.130069E+03   0.408697E+02       87   95   25   31   59
- 
-   94   0.144377E+03   0.787549E+02        6   14   50   61   23   39   13   28
-
-   95  -0.750781E+02   0.283030E+02       85   25   93   87   30   18   47   89
-
-   96   0.638432E+02   0.120454E+02       53   49   33   38   77    4
- 
-   97  -0.794561E+02  -0.483212E+02       34   30   36   92   35
- 
-   98   0.917342E+01  -0.665706E+02       15   52   26    7   70   32   19
- 
-   99   0.120844E+03   0.870531E+02       56   88   28   13    9
- 
-  100   0.111087E+03   0.738062E+02       28   80    5    6
- 
- 
-  NB =        0 boundary arcs.
-  NA =      294 arcs.
-  NT =      196 triangles.
-
-
-
-                  stripack (trlist) output,  n =  100
-
-
-                Node        Longitude         Latitude
-
-
-                   1     0.211223E+02     0.871021E+02
-                   2     0.139614E+03     0.359911E+02
-                   3     0.143553E+03    -0.404439E+02
-                   4     0.663241E+02     0.289983E+02
-                   5     0.121540E+03     0.557715E+02
-                   6     0.111906E+03     0.738008E+02
-                   7    -0.324334E+02    -0.351967E+02
-                   8    -0.142740E+03    -0.283336E+01
-                   9     0.127606E+03     0.873706E+02
-                  10     0.864860E+02    -0.275172E+02
-                  11    -0.163744E+03     0.864229E+01
-                  12    -0.165187E+03     0.204824E+02
-                  13     0.147159E+03     0.848577E+02
-                  14     0.137440E+03     0.687496E+02
-                  15     0.449177E+02    -0.667815E+02
-                  16     0.112020E+02     0.772993E+02
-                  17     0.748834E+02     0.474197E+02
-                  18    -0.743588E+02     0.607811E+01
-                  19     0.341184E+02    -0.772043E+02
-                  20     0.232588E+02    -0.172647E+02
-                  21     0.968858E+01     0.415201E+02
-                  22    -0.146812E+03     0.244241E+02
-                  23     0.173334E+03     0.682516E+02
-                  24    -0.403673E+02     0.340182E+02
-                  25    -0.132832E+03     0.514770E+02
-                  26     0.643207E+00    -0.483685E+02
-                  27     0.432169E+01    -0.471638E+02
-                  28     0.125549E+03     0.811014E+02
-                  29    -0.436391E+02     0.218079E+02
-                  30    -0.800176E+02     0.507818E+01
-                  31    -0.143136E+03     0.420014E+02
-                  32    -0.338979E+02    -0.794178E+02
-                  33     0.721551E+02    -0.613709E+01
-                  34    -0.645614E+02    -0.355907E+02
-                  35    -0.746421E+02    -0.523082E+02
-                  36    -0.124987E+03    -0.370872E+02
-                  37    -0.494288E+02     0.176399E+02
-                  38     0.867377E+02    -0.699280E+01
-                  39    -0.164204E+03     0.739755E+02
-                  40    -0.133503E+03    -0.282445E+02
-                  41    -0.140171E+03    -0.775778E+02
-                  42     0.139266E+03     0.214907E+02
-                  43     0.860593E+02    -0.351287E+02
-                  44    -0.963578E+02    -0.841319E+02
-                  45     0.118057E+03    -0.110889E+02
-                  46     0.111942E+03    -0.536276E+02
-                  47    -0.499320E+02     0.210595E+02
-                  48    -0.160732E+03     0.632352E+02
-                  49     0.459542E+02    -0.695919E+01
-                  50     0.144852E+03     0.694805E+02
-                  51    -0.173889E+03    -0.855112E+02
-                  52     0.109928E+02    -0.501828E+02
- 
- 
- 
-                  53     0.169756E+02     0.663479E+01
-                  54     0.139697E+03    -0.554016E+02
-                  55     0.143452E+03     0.278084E+02
-                  56     0.113432E+03     0.877142E+02
-                  57    -0.267235E+02     0.753294E+02
-                  58    -0.438373E+00     0.623304E+01
-                  59    -0.129822E+03     0.333480E+02
-                  60     0.155528E+03    -0.189092E+02
-                  61     0.149375E+03     0.695154E+02
-                  62     0.298943E+02     0.657977E+02
-                  63    -0.122286E+03    -0.842433E+02
-                  64    -0.147499E+03     0.516615E+02
-                  65     0.107345E+03     0.555208E+01
-                  66     0.130414E+03     0.473541E+02
-                  67    -0.936835E+02    -0.860002E+02
-                  68    -0.320601E+02     0.874180E+02
-                  69     0.521500E+02    -0.299845E+02
-                  70    -0.782874E+02    -0.661765E+02
-                  71    -0.175709E+03    -0.199219E+02
-                  72     0.234922E+02     0.667855E+02
-                  73     0.658562E+02    -0.323476E+02
-                  74    -0.309081E+02     0.602420E+02
-                  75     0.157367E+03    -0.685929E+02
-                  76     0.120732E+03     0.879047E+02
-                  77     0.850219E+02     0.270780E+02
-                  78    -0.147635E+03     0.237313E+02
-                  79    -0.505542E+02    -0.788055E+02
-                  80     0.665294E+02     0.699968E+02
-                  81    -0.546884E+02     0.868637E+02
-                  82     0.426467E+02     0.570777E+02
-                  83     0.139195E+02     0.892081E+02
-                  84     0.269261E+02    -0.204594E+02
-                  85    -0.675344E+02     0.355200E+02
-                  86    -0.136401E+03    -0.125803E+02
-                  87    -0.953961E+02     0.187796E+02
-                  88     0.239845E+02     0.821346E+02
-                  89    -0.710667E+02     0.313203E+02
-                  90    -0.948251E+02     0.734196E+02
-                  91    -0.592951E+02    -0.745010E+01
-                  92    -0.911198E+02    -0.655060E+02
-                  93    -0.130069E+03     0.408697E+02
-                  94     0.144377E+03     0.787549E+02
-                  95    -0.750781E+02     0.283030E+02
-                  96     0.638432E+02     0.120454E+02
-                  97    -0.794561E+02    -0.483212E+02
-                  98     0.917342E+01    -0.665706E+02
-                  99     0.120844E+03     0.870531E+02
-                 100     0.111087E+03     0.738062E+02
- 
- 
- 
-
-
-triangle        vertices            neighbors              arcs
-    kt       n1     n2     n3    kt1    kt2    kt3    ka1    ka2    ka3
-
-     1        1     56     83    182      2      4    259      1      3
-     2        1     83     68    192      3      1    282      2      1
-     3        1     68     88    184      4      2    264      4      2
-     4        1     88     56    183      1      3    263      3      4
-     5        2     55     12     62      6     11     64      5     10
-     6        2     12     48     67      7      5     72      6      5
-     7        2     48     23    111      8      6    130      7      6
-     8        2     23     66    110      9      7    128      8      7
-     9        2     66     65    191     10      8    280      9      8
-    10        2     65     42    165     11      9    220     11      9
-    11        2     42     55    167      5     10    224     10     11
-    12        3     54     75    173     13     17    237     12     16
-    13        3     75     71    151     14     12    194     13     12
-    14        3     71     60     64     15     13     67     14     13
-    15        3     60     45    166     16     14    221     15     14
-    16        3     45     46    168     17     15    226     17     15
-    17        3     46     54    173     12     16    238     16     17
-    18        4     82     21    105     19     23    120     18     22
-    19        4     21     53    104     20     18    118     19     18
-    20        4     53     96    177     21     19    245     20     19
-    21        4     96     77    157     22     20    203     21     20
-    22        4     77     17     28     23     21     27     23     21
-    23        4     17     82     86     18     22     96     22     23
-    24        5     14      6     31     25     30     32     24     30
-    25        5      6    100     33     26     24     34     25     24
-    26        5    100     80    129     27     25    157     26     25
-    27        5     80     17     86     28     26     97     28     26
-    28        5     17     77     22     29     27     27     29     28
-    29        5     77     66    191     30     28    278     31     29
-    30        5     66     14     72     24     29     80     30     31
-    31        6     14     94     73     32     24     81     33     32
-    32        6     94     28     69     33     31     75     35     33
-    33        6     28    100    129     25     32    158     34     35
-    34        7     58     37    131     35     43    162     36     44
-    35        7     37     91     87     36     34     98     37     36
-    36        7     91     34    137     37     35    171     38     37
-    37        7     34     35    146     38     36    187     39     38
-    38        7     35     70    148     39     37    190     40     39
-    39        7     70     98    139     40     38    176     41     40
-    40        7     98     26    124     41     39    149     42     41
-    41        7     26     27    125     42     40    150     43     42
-    42        7     27     20    100     43     41    114     45     43
-    43        7     20     58     99     34     42    111     44     45
-    44        8     87     59    189     45     50    274     46     51
-    45        8     59     22    107     46     44    124     47     46
-    46        8     22     78    108     47     45    126     48     47
-    47        8     78     11     61     48     46     63     49     48
-    48        8     11     71     64     49     47     68     50     49
-    49        8     71     86    160     50     48    210     52     50
-    50        8     86     87    133     44     49    166     51     52
-    51        9     81     76    194     52     55    288     53     56
-    52        9     76     56    182     53     51    260     54     53
-    53        9     56     99    183     54     52    262     55     54
- 
- 
- 
-    54        9     99     13     68     55     53     74     57     55
-    55        9     13     81     71     51     54     78     56     57
-    56       10     45     38    155     57     60    201     58     61
-    57       10     38     33    142     58     56    181     59     58
-    58       10     33     73    145     59     57    185     60     59
-    59       10     73     43     80     60     58     88     62     60
-    60       10     43     45    168     56     59    227     61     62
-    61       11     78     12     65     62     47     70     65     63
-    62       11     12     55      5     63     61     64     66     65
-    63       11     55     60    167     64     62    223     69     66
-    64       11     60     71     14     48     63     67     68     69
-    65       12     78     31    108     66     61    125     71     70
-    66       12     31     64    122     67     65    144     73     71
-    67       12     64     48    121      6     66    142     72     73
-    68       13     99     28    127     69     54    154     76     74
-    69       13     28     94     32     70     68     75     77     76
-    70       13     94     39    112     71     69    131     79     77
-    71       13     39     81    159     55     70    208     78     79
-    72       14     66     50    178     73     30    249     82     80
-    73       14     50     94    179     31     72    251     81     82
-    74       15     73     69    145     75     80    184     83     89
-    75       15     69     52    181     76     74    258     84     83
-    76       15     52     98    124     77     75    148     85     84
-    77       15     98     19     92     78     76    104     86     85
-    78       15     19     46     96     79     77    108     87     86
-    79       15     46     43    168     80     78    228     90     87
-    80       15     43     73     59     74     79     88     89     90
-    81       16     57     72    188     82     85    271     91     94
-    82       16     72     62    106     83     81    121     92     91
-    83       16     62     80    190     84     82    276     93     92
-    84       16     80     88    128     85     83    155     95     93
-    85       16     88     57    184     81     84    265     94     95
-    86       17     80     82    190     23     27    275     96     97
-    87       18     91     37     35     88     91     98     99    102
-    88       18     37     47    130     89     87    160    100     99
-    89       18     47     95    175     90     88    241    101    100
-    90       18     95     30    132     91     89    165    103    101
-    91       18     30     91    137     87     90    172    102    103
-    92       19     98     32    139     93     77    177    105    104
-    93       19     32     67    141     94     92    179    106    105
-    94       19     67     51    180     95     93    255    107    106
-    95       19     51     75    161     96     94    213    109    107
-    96       19     75     46    173     78     95    239    108    109
-    97       20     84     49    176     98    100    244    110    113
-    98       20     49     53    177     99     97    246    112    110
-    99       20     53     58    104     43     98    117    111    112
-   100       20     27     84    126     97     42    152    113    114
-   101       21     72     74    188    102    106    270    115    122
-   102       21     74     24    113    103    101    134    116    115
-   103       21     24     58    116    104    102    137    119    116
-   104       21     58     53     99     19    103    117    118    119
-   105       21     82     62    190    106     18    277    123    120
-   106       21     62     72     82    101    105    121    122    123
-   107       22     59     31    138    108     45    175    127    124
-   108       22     31     78     65     46    107    125    126    127
-   109       23     94     61    179    110    112    250    129    132
-   110       23     61     66    178      8    109    248    128    129
-   111       23     48     39    158    112      7    207    133    130
- 
- 
- 
-   112       23     39     94     70    109    111    131    132    133
-   113       24     74     85    193    114    102    284    135    134
-   114       24     85     47    174    115    113    240    136    135
-   115       24     47     29    130    116    114    161    138    136
-   116       24     29     58    131    103    115    163    137    138
-   117       25     93     95    196    118    123    292    139    146
-   118       25     95     85    195    119    117    291    140    139
-   119       25     85     90    193    120    118    283    141    140
-   120       25     90     48    158    121    119    206    143    141
-   121       25     48     64     67    122    120    142    145    143
-   122       25     64     31     66    123    121    144    147    145
-   123       25     31     93    138    117    122    174    146    147
-   124       26     98     52     76    125     40    148    151    149
-   125       26     52     27    126     41    124    153    150    151
-   126       27     52     84    181    100    125    257    152    153
-   127       28     99     88    183    128     68    261    156    154
-   128       28     88     80     84    129    127    155    159    156
-   129       28     80    100     26     33    128    157    158    159
-   130       29     47     37     88    131    115    160    164    161
-   131       29     37     58     34    116    130    162    163    164
-   132       30     95     87    196    133     90    294    167    165
-   133       30     87     86     50    134    132    166    168    167
-   134       30     86     36    149    135    133    192    169    168
-   135       30     36     97    154    136    134    199    170    169
-   136       30     97     34    146    137    135    188    173    170
-   137       30     34     91     36     91    136    171    172    173
-   138       31     59     93    189    123    107    273    174    175
-   139       32     98     70     39    140     92    176    178    177
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-   142       33     38     96    157    143     57    204    182    181
-   143       33     96     49    177    144    142    247    183    182
-   144       33     49     69    176    145    143    243    186    183
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-   146       34     97     35    147     37    136    189    187    188
-   147       35     97     92    154    148    146    198    191    189
-   148       35     92     70    172     38    147    234    190    191
-   149       36     86     40    160    150    134    212    193    192
-   150       36     40     71    160    151    149    211    195    193
-   151       36     71     75     13    152    150    194    196    195
-   152       36     75     41    161    153    151    214    197    196
-   153       36     41     92    164    154    152    217    200    197
-   154       36     92     97    147    135    153    198    199    200
-   155       38     45     65    165    156     56    219    202    201
-   156       38     65     77    191    157    155    279    205    202
-   157       38     77     96     21    142    156    203    204    205
-   158       39     48     90    120    159    111    206    209    207
-   159       39     90     81    186     71    158    267    208    209
-   160       40     86     71     49    150    149    210    211    212
-   161       41     75     51     95    162    152    213    215    214
-   162       41     51     63    180    163    161    254    216    215
-   163       41     63     44    169    164    162    229    218    216
-   164       41     44     92    172    153    163    235    217    218
-   165       42     65     45    155    166     10    219    222    220
-   166       42     45     60     15    167    165    221    225    222
-   167       42     60     55     63     11    166    223    224    225
-   168       43     46     45     16     60     79    226    227    228
-   169       44     63     67    180    170    163    253    231    229
- 
- 
- 
-   170       44     67     79    141    171    169    230    233    231
-   171       44     79     70    140    172    170    232    236    233
-   172       44     70     92    148    164    171    234    235    236
-   173       46     75     54     12     17     96    237    238    239
-   174       47     85     89    195    175    114    290    242    240
-   175       47     89     95    195     89    174    289    241    242
-   176       49     84     69    181    144     97    256    243    244
-   177       49     96     53     20     98    143    245    246    247
-   178       50     66     61    110    179     72    248    252    249
-   179       50     61     94    109     73    178    250    251    252
-   180       51     67     63    169    162     94    253    254    255
-   181       52     69     84    176    126     75    256    257    258
-   182       56     76     83    194      1     52    287    259    260
-   183       56     88     99    127     53      4    261    262    263
-   184       57     88     68      3    185     85    264    266    265
-   185       57     68     81    192    186    184    281    268    266
-   186       57     81     90    159    187    185    267    269    268
-   187       57     90     74    193    188    186    285    272    269
-   188       57     74     72    101     81    187    270    271    272
-   189       59     87     93    196    138     44    293    273    274
-   190       62     82     80     86     83    105    275    276    277
-   191       65     66     77     29    156      9    278    279    280
-   192       68     83     81    194    185      2    286    281    282
-   193       74     90     85    119    113    187    283    284    285
-   194       76     81     83    192    182     51    286    287    288
-   195       85     95     89    175    174    118    289    290    291
-   196       87     95     93    117    189    132    292    293    294
- 
-  Number of boundary nodes NB =        0
-  Number of arcs NA =                294
-  Number of triangles NT =           196
- 
-  TRPLOT created the triangulation plot file: "stripack_prb_del.eps".
- 
-  Relative area of convex hull =     1.00
- 
-  Output from BNODES:
-  Number of boundary nodes =        0
-  Number of arcs =                294
-  Number of triangles =           196
- 
-  Subroutine DELARC was not tested.
-  Nodes       99 and      100 do not form a removable boundary arc.
- 
-  VRPLOT created the Voronoi plot file: "stripack_prb_vor.eps".
- 
-  Voronoi region for node        1
- 
-     Triangle     Latitude     Longitude     Circumradius
- 
-            2    87.609916     63.587615         0.034421
-            3    87.956253     -2.161075         0.022714
-            4    83.476666     -8.966004         0.074517
-            1    82.431990     70.568015         0.106345
- 
-  INSIDE correctly reports that node N0 is
-  inside its Voronoi region!
- 
-TEST02
-  EDGE can be used to force an edge between two nodes.
-  DEL can be used to delete a node.
- 
-  EDGE has forced an edge between two nodes.
- 
-  Call DELNOD to delete node        9
-  Call DELNOD to delete node        8
-  Call DELNOD to delete node        7
-  Call DELNOD to delete node        6
-  Call DELNOD to delete node        5
-  Call DELNOD to delete node        4
- 
-STRIPACK_PRB
-  Normal end of execution.
- 
-July 21 2007  12:08:21.967 PM
diff --git a/sandbox/stripack/stripack_prb_vor.eps b/sandbox/stripack/stripack_prb_vor.eps
deleted file mode 100644
index 1e9b8b3..0000000
--- a/sandbox/stripack/stripack_prb_vor.eps
+++ /dev/null
@@ -1,288 +0,0 @@
-%!ps-adobe-3.0 epsf-3.0
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-%%title:  Voronoi diagram
-%%creator:  STRIPACK.F90
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diff --git a/sandbox/stripack/stripack_prb_vor.png b/sandbox/stripack/stripack_prb_vor.png
deleted file mode 100644
index d88019c..0000000
Binary files a/sandbox/stripack/stripack_prb_vor.png and /dev/null differ
diff --git a/sandbox/triangulations.g.old b/sandbox/triangulations.g.old
deleted file mode 100644
index 7f1aeb0..0000000
--- a/sandbox/triangulations.g.old
+++ /dev/null
@@ -1,2319 +0,0 @@
-#############################################################################
-##
-#W triangulations.g                                         Laurent Bartholdi
-##
-#H   @(#)$Id: triangulations.g,v 1.24 2011/05/19 12:38:03 gap Exp $
-##
-#Y Copyright (C) 2011, Laurent Bartholdi
-##
-#############################################################################
-##
-##  Triangulations of spheres
-##
-#############################################################################
-
-LASTTIME@ := 0; TIMES@ := []; MARKTIME@ := function(n) # crude time profiling
-    if n=0 then LASTTIME@ := Runtime(); return; fi;
-    if not IsBound(TIMES@[n]) then TIMES@[n] := 0; fi;
-    TIMES@[n] := TIMES@[n]+Runtime() - LASTTIME@;
-    LASTTIME@ := Runtime();
-end;
-
-BindGlobal("EPS@", rec(
-        maxratio := Float(100), # maximum ratio, in triangulation, of circumradius to edge length
-        prec := Sqrt(MACFLOAT_EPS), # points that close are considered equal
-        obst := Float(10^-2), # points that close are suspected to form
-                                 # an obstruction
-        fast := Float(10^-3), # if spider moved that little, just wiggle it
-        ratprec := MACFLOAT_EPS^(3/4), # quality to achieve in rational fct.
-        eps := Sqrt(MACFLOAT_EPS), # error allowed on P1Map
-        fail := fail));
-
-InstallMethod(SPIDERRELATOR@, [IsMarkedSphere],
-        spider->Product(GeneratorsOfGroup(spider!.model){spider!.ordering}));
-
-InstallMethod(NFFUNCTION@, [IsMarkedSphere],
-        spider->NFFUNCTION@(spider!.model, SPIDERRELATOR@(spider)));
-
-
-BindGlobal("POSITIONID@", function(l,x)
-    return PositionProperty(l,y->IsIdenticalObj(x,y));
-end);
-
-BindGlobal("INID@", function(x,l)
-    return ForAny(l,y->IsIdenticalObj(x,y));
-end);
-
-InstallMethod(ViewString, "(FR) for a triangulation",
-        [IsSphereTriangulation],
-        t->CONCAT@("<triangulation with ",Length(t!.v)," vertices, ",Length(t!.e)," edges and ",Length(t!.f)," faces>"));
-
-InstallMethod(String, "(FR) for a triangulation",
-        [IsSphereTriangulation],
-        t->"DelaunayTriangulation(...)");
-
-InstallMethod(DisplayString, "(FR) for a triangulation",
-        [IsSphereTriangulation],
-        function(t)
-    local i, j, s;
-    s := "   vertex | position                                 | neighbours\n";
-    Append(s,"----------+------------------------------------------+-----------------\n");
-    for i in t!.v do
-        Append(s,String(CONCAT@("Vertex ",i.index),9));
-        Append(s," | ");
-        Append(s,String(i.pos,-40));
-        Append(s," |");
-        for j in i.n do APPEND@(s," ",j.index); od;
-        Append(s,"\n");
-    od;
-    Append(s,"----------+------------------------------------------+-----------------\n");
-    Append(s,"     edge | position                                 |frm to lt rt rev\n");
-    Append(s,"----------+------------------------------------------+-----------------\n");
-    for i in t!.e do
-        Append(s,String(CONCAT@("Edge ",i.index),9));
-        Append(s," | ");
-        Append(s,String(i.pos,-40));
-        Append(s," |");
-        for j in [i.from,i.to,i.left,i.right,i.reverse] do Append(s,String(j.index,3)); od;
-        Append(s,"\n");
-    od;
-    Append(s,"----------+------------------------------------------+----------v-----------\n");
-    Append(s,"     face | position                                 | radius   | neighbours\n");
-    Append(s,"----------+------------------------------------------+----------+-----------\n");
-    for i in t!.f do
-        Append(s,String(CONCAT@("Face ",i.index),9));
-        Append(s," | ");
-        Append(s,String(i.pos,-40));
-        Append(s," |");
-        Append(s,String(i.radius,-9));
-        Append(s," |");
-        for j in i.n do Append(s," "); Append(s,String(j.index)); od;
-        Append(s,"\n");
-    od;
-    Append(s,"----------+------------------------------------------+----------+-----------\n");
-    return s;
-end);
-INSTALLPRINTERS@(IsSphereTriangulation);
-
-BindGlobal("LOCATE@", function(t,f0,p)
-    # for an initial face f0 and a P1Point p
-    # f0 is allowed to be <fail>, in which case the first face is chosen
-    # returns either [face,barycentric_coords],
-    #             or [face,edge,edge_coord],
-    #             or [face,edge_in,edge_out,vertex]
-    local baryc, yc, i, seen;
-    
-    if f0=fail then f0 := t!.f[1]; fi;
-    # bad, this can cost linear time. Rather use "rho" method
-    seen := BlistList([1..Length(t!.f)],[]);
-    repeat
-        baryc := List(f0.n,e->P1Image(e.map^-1,p));
-        yc := List(baryc,SphereP1Y);
-        if ForAll(yc,x->x>-MACFLOAT_EPS) or seen[f0.index] then
-            if seen[f0.index] then
-                Info(InfoFR,1,"We're stuck in a loop; I'll exit, cross your fingers");
-            fi;
-            break;
-        fi;
-        i := Position(yc,Minimum(yc));
-        seen[f0.index] := true;
-        f0 := f0.n[i].right;
-    until false;
-    # recall that computations are done 80-bit with p1points,
-    # and returned as 64-bit numbers. MACFLOAT_EPS is safe
-    i := Filtered([1..3],i->AbsoluteValue(yc[i])<MACFLOAT_EPS);
-    if i=[] then # inside face
-        return [f0,yc];
-    elif Size(i)=1 then # on edge
-        i := i[1];
-        baryc := RealPart(Complex(baryc[i]));
-        return [f0,f0.n[i],baryc];
-    elif Size(i)=2 then # at vertex
-        i := Intersection(i,1+i mod 3)[1];
-        return [f0,f0.n[1+((1+i)mod 3)],f0.n[i],f0.n[i].from];
-    else
-        Error("There is probably a triangle with a flat angle. I'm stuck");
-    fi;
-end);
-
-BindGlobal("EDGEMAP@",
-        e->P1Path(e.from.pos,e.to.pos));
-
-DeclareGlobalFunction("SWAPTEST@");
-InstallGlobalFunction(SWAPTEST@, function(p,e)
-    # p is opposite of edge e on face e.left. check if e should be swapped.
-    local a, b, q, bp, pa, aq, qb, f, pqb, qpa;
-    f := e.reverse;
-    a := e.from;
-    b := e.to;
-    for pa in e.left.n do if IsIdenticalObj(pa.from,p) then break; fi; od;
-    for bp in e.left.n do if IsIdenticalObj(bp.to,p) then break; fi; od;
-    for aq in e.right.n do if IsIdenticalObj(aq.from,a) then break; fi; od;
-    for qb in e.right.n do if IsIdenticalObj(qb.to,b) then break; fi; od;
-    q := aq.to;
-    if ImaginaryPart(P1XRatio(p.pos,q.pos,a.pos,b.pos))>0 then
-        Remove(a.n,POSITIONID@(a.n,e));
-        Remove(b.n,POSITIONID@(b.n,f));
-        e.from := p; e.to := q;
-        e.map := EDGEMAP@(e); e.len := P1Distance(p.pos,q.pos);
-        f.from := q; f.to := p;
-        f.map := EDGEMAP@(f); f.len := e.len;
-        pqb := e.left; qpa := e.right;
-        pa.left := qpa; pa.reverse.right := qpa;
-        qb.left := pqb; qb.reverse.right := pqb;
-        pqb.n := [e,qb,bp];
-        qpa.n := [f,pa,aq];
-        Add(p.n,e,POSITIONID@(p.n,pa)+1);
-        Add(q.n,f,POSITIONID@(q.n,qb)+1);
-        Unbind(pqb.radius); # make sure the radius gets recomputed
-        Unbind(qpa.radius);
-        if IsBound(e.gpelement) then
-            pa.gpelement := e.gpelement^-1*pa.gpelement;
-            pa.reverse.gpelement := pa.gpelement^-1;
-            qb.gpelement := e.gpelement*qb.gpelement;
-            qb.reverse.gpelement := qb.gpelement^-1;
-        fi;
-        SWAPTEST@(p,aq);
-        SWAPTEST@(p,qb);
-    fi;
-end);
-
-BindGlobal("CHECKTRIANGULATION@", function(t)
-    local x;
-    x := Filtered(t!.v,v->not ForAll(v.n,e->IsIdenticalObj(e.from,v)));
-    if x<>[] then return false; fi;
-    x := Filtered(t!.e,e->not INID@FR(e,e.from.n) or not INID@FR(e,e.left.n));
-    if x<>[] then return false; fi;
-    x := Filtered(t!.f,f->not ForAll(f.n,e->IsIdenticalObj(e.left,f)));
-    if x<>[] then return false; fi;
-    x := Filtered(t!.f,f->not IsIdenticalObj(LOCATE@(t,f,f.pos)[1],f));
-    if x<>[] then return false; fi;
-    return true;
-end);
-
-BindGlobal("ADDTOTRIANGULATION@", function(t,p)
-    local f, nv, ne, nf, i, d;
-    f := LOCATE@(t,fail,p);
-    if Length(f)=4 then # vertex
-        Error("Two vertices coincide: ",p," and ",f[1]);
-    fi;
-    f := f[1];
-    nv := rec(pos := p, n := [], index := Length(t!.v)+1, operations := t!.v[1].operations); Add(t!.v,nv);
-    ne := [];
-    nf := List([1..2],i->rec(index := Length(t!.f)+i, operations := t!.f[1].operations)); Append(t!.f,nf);
-    nf[3] := f; Unbind(f.radius); # recycle record f
-    for i in [1..3] do
-        ne[i] := rec(from := nv, to := f.n[i].from, left := nf[i], right := nf[1+(i+1) mod 3], len := P1Distance(nv.pos,f.n[i].from.pos));
-        ne[i+3] := rec(from := ne[i].to, to := nv, left := ne[i].right, right := nf[i], reverse := ne[i], len := ne[i].len);
-        ne[i].reverse := ne[i+3];
-    od;
-    for i in [1..6] do
-        ne[i].map := EDGEMAP@(ne[i]);
-        ne[i].index := Length(t!.e)+i;
-        ne[i].operations := t!.e[1].operations;
-        if IsBound(t!.e[1].gpelement) then
-            ne[i].gpelement := One(t!.e[1].gpelement);
-        fi;
-    od;
-    Append(t!.e,ne);
-    d := f.n; # f.n will get overwritten below
-    for i in [1..3] do
-        nf[i].n := [ne[i],d[i],ne[4+i mod 3]];
-        f.n[i].left := nf[i];
-        f.n[i].reverse.right := nf[i];
-        Add(d[i].from.n,ne[i+3],POSITIONID@(d[i].from.n,d[i])+1);
-    od;
-    nv.n := ne{[1..3]};
-    
-    # flip diagonals if needed, to preserve Delaunay condition
-    for i in d do SWAPTEST@(nv,i); od;
-end);
-
-# these should all be objects, in clean implementation
-BindGlobal("ISVERTEX@", r->IsBound(r.n) and not IsBound(r.radius));
-BindGlobal("ISEDGE@", r->IsBound(r.to));
-BindGlobal("ISFACE@", r->IsBound(r.radius));
-
-InstallMethod(DelaunayTriangulation, "(FR) for a list of points",
-        [IsList], points->DelaunayTriangulation(points,MACFLOAT_INF));
-
-InstallMethod(DelaunayTriangulation, "(FR) for a list of points and a quality",
-        [IsList, IsFloat],
-        function(points,quality)
-    local t, i, order, n, im, p, d, idle, print;
-    
-    while not ForAll(points,IsP1Point) do
-        Error("DelaunayTriangution: argument should be a list of points on P1");
-    od;
-    
-    print := rec(ViewObj := function(x)
-        if ISVERTEX@(x) then
-            Print("<vertex ",x.index,List(x.n,e->e.index),">");
-        elif ISEDGE@(x) then
-            Print("<edge ",x.index,List([x.from,x.to],v->v.index),">");
-        else
-            Print("<face ",x.index,List(x.n,e->e.index),">");
-        fi;
-    end, PrintObj := ~.ViewObj);
-        
-    n := Length(points);
-    if n=0 then points := [P1infinity]; n := 1; fi;    
-    d := List(points,x->P1Distance(points[n],x));
-    order := [n]; # points[order[1]] is last point, presumably infinity
-    im := List(d,v->AbsoluteValue(v-MACFLOAT_PI/2));
-    i := POSITIONID@(im,MinimumList(im));
-    if im[i]>=MACFLOAT_PI/6 then # all points are more or less aligned to points[order[1]]
-        points := ShallowCopy(points);
-        i := POSITIONID@(d,MaximumList(d));
-        if d[i]<MACFLOAT_PI/2 then # actually all points are close to points[order[1]]
-            Add(points,P1Antipode(points[n]));
-            Add(order,Length(points));
-        else
-            Add(order,i);
-        fi;
-        for p in [P1Point(1),P1Point(0,1),P1Point(-1),P1Point(0,-1)] do
-            t := P1Map(points[n],points[order[2]]);
-            Add(points,P1Image(t,p));
-            Add(order,Length(points));
-        od;
-    else # points[i] is roughly at 90 degrees from points[n]
-        t := P1Map(points[n],points[i],P1Antipode(points[n]));
-        # so t(0)=points[n], t(1)=points[i]. Try to find points close to t^-1(infty,-1,i,-i).
-        i := t^-1; im := List(points,x->P1Image(i,x));
-        for p in [P1Point(infinity),P1Point(1),P1Point(0,1),P1Point(-1),P1Point(0,-1)] do
-            d := List(im,x->P1Distance(x,p));
-            i := POSITIONID@(d,MinimumList(d));
-            if d[i]>=MACFLOAT_PI/6 then
-                if Length(points)=n then points := ShallowCopy(points); fi;
-                Add(points,P1Image(t,p));
-                Add(order,Length(points));
-            else
-                Add(order,i);
-            fi;
-        od;
-    fi;
-    Assert(1,IsDuplicateFreeList(order),"DelaunayTriangulation couldn't create octahedron");
-
-    Append(order,Difference([1..n],order)); # so now order[1..6] is roughly an octahedron:
-    # points{order{[1..6]}} = [0,infty,1,i,-1,-i]
-
-    # create the octahedron
-    t := rec(v := List([1..6],i->rec(pos := points[order[i]], n := [], index := order[i], operations := print)),
-             e := List([1..24],i->rec(index := i, operations := print)),
-             f := List([1..8],i->rec(index := i, operations := print)));
-    for i in [1..2] do t.v[i].n := t.e{8*i-8+[1,3,5,7]}; od;
-    for i in [1..4] do t.v[i+2].n := t.e{[2*i,24-2*((5-i) mod 4),18-2*i,15+2*i]}; od;
-    for i in [1..4] do t.f[i].n := t.e{[15+2*i,2+2*(i mod 4),2*i-1]}; od;
-    for i in [1..4] do t.f[i+4].n := t.e{[16+2*i,18-2*i,15-2*(i mod 4)]}; od;
-    for p in t.v do for i in p.n do i.from := p; od; od;
-    for p in t.f do for i in p.n do i.left := p; od; od;
-    for i in [1..24] do
-        t.e[i].reverse := t.e[i-(-1)^i];
-        t.e[i].to := t.e[i].reverse.from;
-        t.e[i].right := t.e[i].reverse.left;
-        t.e[i].map := EDGEMAP@(t.e[i]);
-        t.e[i].len := P1Distance(t.e[i].from.pos,t.e[i].to.pos);
-    od;
-
-    # now add the other points
-    for i in [7..Length(points)] do
-        ADDTOTRIANGULATION@(t,points[order[i]]);
-        t.v[i].index := order[i];
-    od;
-    
-    t.v{order} := ShallowCopy(t.v); # reorder the points as they were before
-    
-    repeat
-        idle := true;
-        for i in t.f do
-            if IsBound(i.radius) then continue; fi;
-            p := CallFuncList(P1Circumcentre,List(i.n,e->e.from.pos));
-            i.centre := p[1];
-            i.radius := p[2];
-            p := i.radius / MinimumList(List(i.n,e->e.len));
-            if p > quality then
-                ADDTOTRIANGULATION@(t,i.centre);
-                idle := false;
-            fi;
-        od;
-    until idle;
-    
-    for i in [n+1..Length(t.v)] do # remember these are added vertices
-        t.v[i].fake := true;
-    od;
-    for i in t.e do
-        i.pos := P1Barycentre(i.from.pos,i.to.pos);
-    od;
-    for i in t.f do
-        i.pos := P1Barycentre(List(i.n,x->x.from.pos));
-    od;
-    t := Objectify(TYPE_TRIANGULATION,t);
-    return t;
-end);
-
-BindGlobal("COPYTRIANGULATION@", function(t)
-    local r, i, j;
-    r := rec(v := StructuralCopy(t!.v),
-             e := [],
-             f := []);
-    for i in r.v do
-        for j in i.n do r.e[j.index] := j; r.f[j.left.index] := j.left; od;
-    od;
-    return Objectify(TYPE_TRIANGULATION, r);
-end);
-
-BindGlobal("WIGGLETRIANGULATION@", function(t,points)
-    # move positions in t so vertices match <points>
-    local r, i, j;
-    r := rec(v := StructuralCopy(t!.v),
-             e := [],
-             f := [],
-             wiggled := MACFLOAT_0);
-    for i in [1..Length(r.v)] do
-        if not IsBound(r.v[i].fake) then
-            r.wiggled := r.wiggled + P1Distance(r.v[i].pos, points[i]);
-            r.v[i].pos := points[i];
-        fi;
-        for j in r.v[i].n do r.e[j.index] := j; od;
-    od;
-    for i in r.e do
-        r.f[i.left.index] := i.left;
-        i.pos := P1Barycentre(i.from.pos,i.to.pos);
-        i.map := EDGEMAP@(i);
-    od;
-    for i in r.f do
-        i.pos := P1Barycentre(List(i.n,e->e.to.pos));
-    od;
-    return Objectify(TYPE_TRIANGULATION, r);
-end);
-
-BindGlobal("CLOSESTFACES@", function(x)
-    if ISFACE@(x) then
-        return [x];
-    elif ISEDGE@(x) then
-        return [x.left,x.right];
-    else
-        return List(x.n,x->x.to.left);
-    fi;
-end);
-
-BindGlobal("CLOSESTVERTICES@", function(x)
-    if ISFACE@(x) then
-        return List(x.n,x->x.to);
-    elif ISEDGE@(x) then
-        return [x.to,x.from];
-    else
-        return [x];
-    fi;
-end);
-
-InstallMethod(LocateInTriangulation, "(FR) for a triangulation and point",
-        [IsSphereTriangulation, IsP1Point],
-        function(t,p)
-    return LOCATE@(t,fail,p)[1];
-end);
-
-InstallMethod(LocateInTriangulation, "(FR) for a triangulation, face/edge/vertex and point",
-        [IsSphereTriangulation, IsRecord, IsP1Point],
-        function(t,s,p)
-    if ISFACE@(s) then
-        return LOCATE@(t,s,p)[1];
-    elif ISEDGE@(s) then
-        return LOCATE@(t,s.left,p)[1];
-    else
-        return LOCATE@(t,s.n[1].left,p)[1];
-    fi;
-end);
-
-BindGlobal("INTERPOLATE_ARC@", function(l)
-    # interpolate along points of l
-    local r, i, p;
-    r := ShallowCopy(l);
-    i := 1;
-    while i<Length(r) do
-        if P1Distance(r[i],r[i+1])>MACFLOAT_PI/12 then
-            Add(r,P1Barycentre(r[i],r[i+1]),i+1);
-        else
-            i := i+1;
-        fi;
-    od;
-    return r;
-end);
-
-BindGlobal("PRINTPT@", function(f,p1p,sep,s)
-    local p;
-    p := sep*SphereP1(p1p);
-    PrintTo(f, p[1], " ", p[2], " ", p[3], s, "\n");
-end);
-
-BindGlobal("PRINTARC@", function(f,a,col,sep)
-    local j;
-    a := INTERPOLATE_ARC@(a);
-    PrintTo(f, "ARC ",Length(a)," ",String(col[1])," ",String(col[2])," ",String(col[3]),"\n");
-    for j in a do
-        PRINTPT@(f, j, sep, "");
-    od;
-end);
-
-BindGlobal("PRINTPOINTS@", function(f,t,extrapt)
-    local i, x, n, arcs;
-    
-    arcs := ValueOption("noarcs")=fail;
-    
-    if arcs then
-        n := Length(t!.v)+Length(t!.f);
-    else
-        n := Number(t!.v,v->not IsBound(v.fake));
-    fi;
-    PrintTo(f, "POINTS ",n+Length(extrapt),"\n");
-    for i in t!.v do
-        if IsBound(i.fake) and arcs then
-            PRINTPT@(f, i.pos, MACFLOAT_1, " 0.5");
-        elif not IsBound(i.fake) then
-            if i.pos=P1infinity then
-                x := "infty";
-            else
-                x := ViewString(CleanedP1Point(i.pos,EPS@.prec));
-            fi;
-            PRINTPT@(f, i.pos, MACFLOAT_1, Concatenation(" 2.0 ",x));
-        fi;
-    od;
-    if arcs then
-        for i in t!.f do PRINTPT@(f, i.pos, MACFLOAT_1, " 1.0"); od;
-    fi;
-    for i in extrapt do PRINTPT@(f, i.pos, MACFLOAT_1, " 0.5"); od;
-end);
-
-InstallMethod(Draw, "(FR) for a triangulation",
-        [IsSphereTriangulation],
-        function(t)
-    local s, f, i;
-    s := ""; f := OUTPUTTEXTSTRING@(s);
-    
-    if ValueOption("upper")<>fail then
-        PrintTo(f,"UPPER");
-    fi;
-    if ValueOption("lower")<>fail then
-        PrintTo(f,"LOWER");
-    fi;
-    
-    PRINTPOINTS@(f,t,[]);
-    
-    if ValueOption("noarcs")<>fail then
-        PrintTo(f, "ARCS 0\n");
-    else
-        PrintTo(f, "ARCS ", Length(t!.e),"\n");
-        for i in t!.e do if i.index > i.reverse.index then
-            PRINTARC@(f, [i.from.pos,i.pos,i.to.pos], [255,0,255], MACFLOAT_1);
-            PRINTARC@(f, [i.left.pos,i.pos,i.right.pos], [0,255,255], MACFLOAT_1);
-        fi; od;
-    fi;
-    
-    Info(InfoFR,3,"calling javaplot with:\n",s);
-    JAVAPLOT@(InputTextString(s));
-end);
-##############################################################################
-
-##############################################################################
-##
-#M  MarkedSpheres
-##
-InstallMethod(ViewString, "(FR) for a point in Teichmuller space",
-        [IsMarkedSphere],
-        s->Concatenation("<marked sphere on ",ViewString(s!.cut)," marked by ",String(s!.marking),">"));
-
-InstallMethod(DisplayString, "(FR) for a point in Teichmuller space",
-        [IsMarkedSphere],
-        s->CONCAT@(DisplayString(s!.cut),"Spanning tree on edges ",List(s!.treeedge,r->r.index)," costing ",s!.treecost,"\nMarking ",s!.marking,"\n"));
-
-INSTALLPRINTERS@(IsMarkedSphere);
-
-BindGlobal("STRINGCOMPLEX@",
-    z->CONCAT@(RealPart(z)," ",ImaginaryPart(z)));
-
-InstallMethod(Draw, "(FR) for a point in Teichmuller space",
-        [IsMarkedSphere],
-        function(spider)
-    local a, i, j, k, s, f, t, points, arcs;
-    s := ""; f := OUTPUTTEXTSTRING@(s);
-    
-    if ValueOption("upper")<>fail then
-        PrintTo(f,"UPPER\n");
-    fi;
-    if ValueOption("lower")<>fail then
-        PrintTo(f,"LOWER\n");
-    fi;
-    if IsBound(spider!.map) and ValueOption("julia")<>fail then
-        t := DegreeOfP1Map(spider!.map);
-        PrintTo(f,"FUNCTION");
-        a := List(CoefficientsOfP1Map(spider!.map),ShallowCopy);
-        for i in [1..t+1] do PrintTo(f," ",STRINGCOMPLEX@(a[1][i])); od;
-        for i in [1..t+1] do PrintTo(f," ",STRINGCOMPLEX@(a[2][i])); od;
-        PrintTo(f,"\nCYCLES");
-        if IsBound(spider!.cycle) then
-            for i in spider!.cycle do
-                if i[1]=P1infinity then
-                    PrintTo(f," Infinity any");
-                else
-                    PrintTo(f," ",STRINGCOMPLEX@(Complex(i[1])));
-                fi;
-                PrintTo(f," ",i[2]," ",i[3]);
-            od;
-        fi;
-        t := ValueOption("julia");
-        if IsList(t) then # size, maxiter
-            i := t[1]; j := t[1];
-        elif IsPosInt(t) then
-            i := t; j := 100;
-        else
-            i := 500; j := 100;
-        fi;
-        PrintTo(f,"\nIMAGE ",i," ",j,"\n");
-    fi;
-    
-    if IsBound(spider!.points) then
-        points := spider!.points;
-    else
-        points := [];
-    fi;
-    if IsBound(spider!.arcs) then
-        arcs := spider!.arcs;
-    else
-        arcs := [];
-    fi;
-    
-    t := spider!.cut;
-    PRINTPOINTS@(f, t, points);
-
-    if ValueOption("noarcs")<>fail then
-        PrintTo(f, "ARCS 0\n");
-    else
-        PrintTo(f, "ARCS ", Length(t!.e)+Length(arcs),"\n");
-        for i in t!.e do
-            if i.from.index>i.to.index then # print only in 1 direction
-                continue;
-            fi;
-            j := [128,64,64];
-            k := [64,128,64];
-            if not IsOne(i.gpelement) then
-                j := [255,64,64];
-            else
-                k := [64,255,64];
-            fi;
-            PRINTARC@(f, [i.from.pos,i.pos,i.to.pos], j, Float(101/100));
-            PRINTARC@(f, [i.left.pos,i.pos,i.right.pos], k, Float(102/100));
-        od;
-        for a in arcs do PRINTARC@(f, a[3], a[1], a[2]); od;
-    fi;
-    
-    Info(InfoFR,3,"calling javaplot with:\n",s);
-    JAVAPLOT@(InputTextString(s));
-end);
-
-BindGlobal("CHECKSPIDER@", function(s)
-    return CHECKTRIANGULATION@(s!.cut) and IsOne(SPIDERRELATOR@(s)^s!.marking);
-end);
-
-BindGlobal("CHECKREC@", function(recur,order,reduce)
-    local i, j, a, result, w;
-    
-    result := [[],[]];
-    for i in [1..Length(recur[2][1])] do
-        w := One(recur[1][1][1]);
-        a := i;
-        for j in order do
-            w := w*recur[1][j][a];
-            a := recur[2][j][a];
-        od;
-        Add(result[1],reduce(w));
-        Add(result[2],a);
-    od;
-    return result[2]=[1..Length(recur[2][1])] and ForAll(result[1],IsOne);
-end);
-
-BindGlobal("TRIVIALSPIDER@", function(points)
-    # constructs a spider with identity marking on <points>
-    local n, f, r, g, edges, tree, cost, p, i, e;
-    n := Length(points);
-    f := FreeGroup(n-1);
-    r := rec(model := f,                            # marking group
-             cut := DelaunayTriangulation(points,EPS@.maxratio), # triangulation
-             group := f,                            # group on spanning tree
-             marking := IdentityMapping(f),         # isomorphism between them
-             intree := [],                          # if an edge is in the tree
-             treeedge := []);                       # for each generator, a preferred edge with that label
-
-    # construct a spanning tree
-    edges := List(r!.cut!.e,e->[e.from.index,e.to.index]);
-    cost := List(r!.cut!.e,e->e.len);
-    tree := MINSPANTREE@(edges,cost);
-    r.treecost := Remove(tree);
-    tree := List(tree,p->First(r.cut!.v[p[1]].n,e->e.to.index=p[2]));
-    SortParallel(cost{List(tree,e->e.index)},tree);
-    
-    # start by a free group on the edges of the tree
-    # by convention, if the edge goes north, then the generator, with
-    # positive orientation, goes from west to east.
-    g := FreeGroup(Length(tree));
-    p := PresentationFpGroup(g,0);
-    TzOptions(p).protected := Length(tree);
-    TzInitGeneratorImages(p);
-    
-    for i in r.cut!.e do i.gpelement := One(g); od;
-    r.intree := ListWithIdenticalEntries(Length(edges),false);
-    for i in [1..Length(tree)] do
-        e := GeneratorsOfGroup(g)[i];
-        tree[i].gpelement := e;
-        tree[i].reverse.gpelement := e^-1;
-        r.intree[tree[i].index] := true;
-        r.intree[tree[i].reverse.index] := true;
-    od;
-    
-    # add relators saying the cycle around a fake vertex is trivial
-    for i in r!.cut!.v do
-        if IsBound(i.fake) then
-            AddRelator(p,Product(List(Reversed(i.n),e->e.gpelement)));
-        fi;
-    od;
-    
-    # eliminate useless generators, starting by the shortest
-    for i in GeneratorsOfPresentation(p) do
-        TzEliminate(p,i);
-    od;
-    for i in r.cut!.e do i.gpelement := One(f); od;
-    for i in [1..Length(tree)] do
-        e := MappedWord(TzImagesOldGens(p)[i],GeneratorsOfPresentation(p),GeneratorsOfGroup(f));
-        tree[i].gpelement := e;
-        tree[i].reverse.gpelement := e^-1;
-    od;
-    
-    r.treeedge := List(TzPreImagesNewGens(p),w->tree[TietzeWordAbstractWord(w)[1]]);
-
-    return Objectify(TYPE_SPIDER,r);
-end);
-
-BindGlobal("COPYSPIDER@", function(spider)
-    local r;
-    r := rec(model := spider!.model,
-             cut := COPYTRIANGULATION@(spider!.cut),
-             group := spider!.group,
-             marking := spider!.marking,
-             treecost := spider!.treecost,
-             intree := spider!.intree);
-    r.treeedge := r.cut!.e{List(spider!.treeedge,e->e.index)};
-    if IsBound(spider!.ordering) then
-        r.ordering := spider!.ordering;
-    fi;
-
-    return Objectify(TYPE_SPIDER,r);
-end);
-
-BindGlobal("WIGGLESPIDER@", function(spider,points)
-    # move vertices of spider to <points>
-    local r;
-    r := rec(model := spider!.model,
-             cut := WIGGLETRIANGULATION@(spider!.cut,points),
-             group := spider!.group,
-             marking := spider!.marking,
-             treecost := spider!.treecost,
-             intree := spider!.intree);
-    r.treeedge := r.cut!.e{List(spider!.treeedge,e->e.index)};
-    if IsBound(spider!.ordering) then
-        r.ordering := spider!.ordering;
-    fi;
-
-    return Objectify(TYPE_SPIDER,r);
-end);
-
-InstallMethod(TREEBOUNDARY@, [IsMarkedSphere],
-        function(spider)
-    # return a list of edges traversed when one surrounds the tree with
-    # it on our left. visit vertex n first.
-    local i, e, edges, n;
-
-    n := Length(VERTICES@(spider));
-    e := First(spider!.cut!.e,e->spider!.intree[e.index] and e.from.index=n);
-    edges := [];
-    repeat
-        Add(edges,e);
-        i := POSITIONID@(e.to.n,e.reverse);
-        repeat
-            i := i+1;
-            if i>Length(e.to.n) then i := 1; fi;
-        until spider!.intree[e.to.n[i].index];
-        e := e.to.n[i];
-    until IsIdenticalObj(e,edges[1]);
-    return edges;
-end);
-
-BindGlobal("IMGMARKING@", function(spider,model)
-    # changes the marking group so that it's generated by lollipops
-    # around punctures.
-    # model is the group to be used for these lollipops; it has one generator
-    # per non-fake vertex.
-    # the command sets the fields "ordering" and "marking" in spider
-    local e, image, ordering;
-
-    spider!.model := model;
-    ordering := [];
-    image := [];
-
-    for e in TREEBOUNDARY@(spider) do
-        if not IsBound(e.from.fake) then
-            if not IsBound(image[e.from.index]) then
-                image[e.from.index] := One(spider!.group);
-                Add(ordering,e.from.index);
-            fi;
-            image[e.from.index] := image[e.from.index] / e.gpelement;
-        fi;
-    od;
-    while ordering[1]<>Length(ordering) do # force ordering[n]=n
-        Add(ordering,Remove(ordering,1));
-    od;
-    spider!.ordering := Reversed(ordering);
-    spider!.marking := GroupHomomorphismByImagesNC(model,spider!.group,GeneratorsOfGroup(model),image{[1..Length(GeneratorsOfGroup(model))]});
-end);
-##############################################################################
-
-##############################################################################
-##
-#M  Function to IMG
-##
-BindGlobal("MATCHPOINTS@", function(ptA, ptB)
-    # ptA is a list of n points; ptB[i] is a list of neighbours of ptA[i]
-    # each ptB[i][j] is a sphere point
-    # returns: a matching i|->j(i), [1..n]->[1..n] such that
-    # ptA is at least 2x closer to ptB[i][j(i)] as to other neighbours;
-    # or return fail if no such matching exists.
-    local i, j, dists, perm;
-
-    dists := [];
-    for i in [1..Length(ptA)] do
-        dists[i] := List(ptB[i],v->P1Distance(ptA[i],v));
-    od;
-    perm := List(dists, l->Position(l,Minimum(l)));
-
-    for i in [1..Length(dists)] do
-        for j in [1..Length(dists[i])] do
-            if j<>perm[i] and dists[i][j]<dists[i][perm[i]]*2 then
-                return fail;
-            fi;
-        od;
-    od;
-    return perm;
-end);
-
-BindGlobal("ESSDISJOINT@", function(ratmap,p0,p1,domain)
-    # return true if ratmap(P1Path(p0,p1)) is essentially disjoint
-    # from domain's boundary
-    local e, tu, delta, d;
-    if p0=p1 then return true; fi;
-    d := P1Distance(p0,p1);
-    delta := P1Path(p0,p1);
-    for e in domain.n do
-        tu := P1INTERSECT(e.map,ratmap,delta);
-        for tu in tu do
-            if d*(MACFLOAT_1/2-AbsoluteValue(MACFLOAT_1/2-tu[2])) > EPS@.eps then
-                return false;
-            fi;
-        od;
-    od;
-    return true;
-end);
-
-BindGlobal("CHOOSEBYSUBDIVISION@", function(ratmap,p0,t0,gamma,candidates,upbdry,downcell)
-    # candidates is a list of records containing in particular fields pos and t.
-    # returns the one such gamma[t0,candidate.t] (which stays in downcell)
-    # lifts to a path from p0 to candidate.pos and staying in upcell.
-    local c, i, p, subdiv;
-    
-    # first a very cheap test: if one candidate is a "to", and the other is a neighbour
-    if not IsBound(candidates[1].d) and ForAll([2..Length(candidates)],i->ESSDISJOINT@(ratmap,candidates[1].pos,candidates[i].pos,downcell)) then
-        return candidates[1];
-    fi;
-    
-    # then a cheap test: is one of the paths ratmap(p0->c.pos) completely in the downcell?
-    
-    c := Filtered(candidates,c->ESSDISJOINT@(ratmap,p0,c.pos,downcell));
-    if Length(c)>=1 then
-        # OK, we found one. Just in case, if there's a "to" vertex we can go to from here
-        # (i.e. we overshot), return back to that "to".
-        c := c[1];
-        if IsBound(c.d) and c.t >= MACFLOAT_1-EPS@.eps then # try "to"
-            for i in candidates do
-                if not IsBound(i.d) and ESSDISJOINT@(ratmap,i.pos,c.pos,downcell) then
-                    c := i;
-                    break;
-                fi;
-            od;
-        fi;
-        return c;
-    fi;
-    
-    # now try harder: all the paths p0->c.pos project to some curve that
-    # wiggles out of downcell.
-    
-    subdiv := [rec(t := t0, pos := p0)];
-    for c in candidates do
-        if IsBound(c.t) then
-            Add(subdiv, rec(t := c.t, result := c));
-        else
-            Add(subdiv, rec(t := MACFLOAT_1, result := c));
-        fi;
-    od;
-    Sort(subdiv,function(x,y) return x.t < y.t; end);
-    i := 2;
-    while true do
-        if not IsBound(subdiv[i].lifts) then
-            subdiv[i].lifts := [];
-            for p in P1PreImages(ratmap,P1Image(gamma,P1Point(subdiv[i].t))) do
-                if ForAll(upbdry,e->SphereP1Y(P1Image(e.map^-1,p))>-MACFLOAT_EPS) then
-                    Add(subdiv[i].lifts,p);
-                fi;
-            od;
-        fi;
-        Assert(1,Length(subdiv[i].lifts)>=1,"No lift in LIFTARC -- I'm stymied");
-        if Length(subdiv[i].lifts)=1 then # just one choice
-            p := subdiv[i].lifts[1];
-        else
-            p := Filtered(subdiv[i].lifts,p->ESSDISJOINT@(ratmap,subdiv[i-1].pos,p,downcell));
-            Assert(1,Length(p)<=1,"More than one lift in LIFTARC -- I'm stymied");
-            if p=[] then # subdivide
-                Add(subdiv,rec(t := (subdiv[i-1].t+subdiv[i].t)/2));
-                p := fail;
-            else # we got just one lift -- hurray
-                p := p[1];
-            fi;
-        fi;
-        # is this lift actually one of our candidates?
-        if p<>fail then
-            if IsBound(subdiv[i].result) and ESSDISJOINT@(ratmap,subdiv[i].result.pos,p,downcell) then
-                return subdiv[i].result;
-            fi;
-            subdiv[i].pos := p;
-            i := i+1;
-        fi;
-    od;
-end);
-
-BindGlobal("SELECTCANDIDATES@", function(l,r,lift,xings)
-    # this code is not used. It should return a list of candidates among xings,
-    # such that there exist a choice of non-overlapping arcs in upcell
-    # that connect the "in" and "out" intersections in xings
-    local tu, e, i, c, curface, curtime, curbdry, candidates;
-    
-    Error("@@ this code is not used at all, and certainly broken");
-    
-    candidates := [];
-    tu := [-r..l];
-    e := lift.e.reverse;
-    i := POSITIONID@(xings[e.index],lift.reverse);
-    l := 0;
-    repeat
-        curbdry := curface.n;
-        break;
-        i := i+1;
-        while i > Length(xings[e.index]) do
-            i := POSITIONID@(curface.n,e)+1;
-            if i>Length(curface.n) then i := 1; fi;
-            e := curface.n[i];
-            i := 1;
-        od;
-        if IsIdenticalObj(xings[e.index][i],lift.reverse) and IsIdenticalObj(e,lift.e.reverse) then
-            break;
-        fi;
-        # now consider xings[e.index][i]. If it's in/outcoming,
-        # update l.
-        # if l is in range [-#from..#to], and time >= curtime,
-        # add it to candidates.
-        c := xings[e.index][i];
-        if c.t >= curtime and c.d >= 0 and l in tu then
-            Add(candidates,c);
-        fi;
-        # if r.d=0, we don't know if r moves in or out, so we
-        # just increase the interval.
-        if c.d=0 then tu := [Minimum(tu)-1..Maximum(tu)+1]; fi;
-        l := l+r.d;
-    until false;
-end);
-
-BindGlobal("LIFTARC@", function(spider,ratmap,from,to,gamma,domain)
-    # <gamma> is an arc in the range, contained in face <domain>, which we
-    # want to lift through <ratmap>.
-    # <from> and <to> are described in LIFTEDGE@, as is the return value
-    local curtime, curface, curbdry, lift, lifts, xings, candidates,
-          fromface, toface,
-          e, f, i, l, r, tu, c;
-    
-    # the results will go there
-    lifts := [];
-
-    # xings[edge.index] are the (left-to-right) crossings of gamma with f(edge)
-    xings := [];
-    
-    # from, to are lists indexed by faces, containing the starts and ends of lifts
-    fromface := [];
-    for f in from do
-        if not IsBound(fromface[f.cell.index]) then fromface[f.cell.index] := []; fi;
-        Add(fromface[f.cell.index],f);
-    od;
-    toface := [];
-    for f in to do
-        if not IsBound(toface[f.cell.index]) then toface[f.cell.index] := []; fi;
-        Add(toface[f.cell.index],f);
-    od;
-    
-    for lift in from do
-        curface := lift.cell;
-        # set start time: -epsilon if we're almost on an edge
-        if Length(LOCATE@(spider!.cut,curface,lift.pos))>=3 then
-            curtime := -EPS@.eps; # we start on an edge or vertex
-        else
-            curtime := MACFLOAT_0; # we start in a face
-        fi;
-        Remove(fromface[curface.index],1); # we're dealing with it
-        # lift is initially rec(cell, pos, elt), and records a position,
-        # presumably at a crossing.
-        # it may acquire t (time along gamma), e (edge),
-        # u (crossing time along edge), d (direction: 1 for left-right,
-        # 0 for indifferent, -1 for right-left)
-        repeat
-            # compute edge intersections on neighbours of lift.cell
-            for e in curface.n do
-                if not IsBound(xings[e.index]) then
-                    # get list of [t,u,d,p,q] such that gamma(t)=delta(u)=p, e.map(u)=q;
-                    # d=Im(gamma^-1*delta)'(u)
-                    tu := P1INTERSECT(gamma,ratmap,e.map);
-                    # in increasing order along the edge
-                    Sort(tu,function(x,y) return x[2]<y[2]; end);
-                    l := []; r := []; i := 1;
-                    for tu in tu do
-                        Add(l, rec(t := tu[1], u := tu[2], d := tu[3], gammapos := tu[4], pos := tu[5], e := e));
-                        Add(r, rec(t := tu[1], u := (MACFLOAT_1-tu[2])/(MACFLOAT_1+tu[2]), d := -tu[3], gammapos := tu[4], pos := tu[5], e := e.reverse));
-                        l[i].reverse := r[i];
-                        r[i].reverse := l[i];
-                        i := i+1;
-                    od;
-                    xings[e.index] := l;
-                    xings[e.reverse.index] := Reversed(r);
-                fi;
-            od;
-            
-            # out of the xings, find candidates:
-            # - all endpoints of paths (in list "to")
-            # - among edge crossings, only those at time >= curtime
-            # - if we're parallel to an edge, all on that edge
-            # - for the other ("boundary") crossings, only those pointing
-            #   outward, and separated by (algebraically) >= #to and <= #from
-            #   on the current face(s).
-            if IsBound(toface[curface.index]) then
-                candidates := ShallowCopy(toface[curface.index]);
-            else
-                candidates := [];
-            fi;
-            if not IsBound(lift.d) then # initial point, we're in a triangle
-                curbdry := curface.n;
-                for e in curbdry do
-                    for c in xings[e.index] do
-                        if c.t >= curtime and c.d >= 0 then
-                            Add(candidates,c);
-                        fi;
-                    od;
-                od;
-            elif lift.d=0 then # we're parallel to an edge, i.e.
-                # inside a lozenge, take everything
-                curbdry := [];
-                for e in curface.n do
-                    if not IsIdenticalObj(e.reverse,lift.e) then
-                        Add(curbdry,e);
-                    fi;
-                od;
-                for e in lift.e.n do
-                    if not IsIdenticalObj(e,lift.e) then
-                        Add(curbdry,e);
-                    fi;
-                od;
-                for c in xings[lift.e.index] do
-                    if c.t >= curtime then
-                        Add(candidates,c);
-                    fi;
-                od;
-                for e in curbdry do
-                    for c in xings[e.index] do
-                        if c.t >= curtime and c.d >= 0 then
-                            Add(candidates,c);
-                        fi;
-                    od;
-                od;
-            else # we're on a side. make linear list of candidates, and
-                # count the number of in/out in xings[]
-                # along the way, starting from lift.e[lift.u]
-                #if IsBound(fromface[curface.index]) then
-                #    l := fromface[curface.index]);
-                #else
-                #    l := [];
-                #fi;
-                #if IsBound(toface[curface.index]) then
-                #    r := toface[curface.index];
-                #else
-                #    r := [];
-                #fi;                
-                #candidates := SELECTCANDIDATES@(l,r,lift,xings,curface);
-                for e in curface.n do
-                    for c in xings[e.index] do
-                        if c.t >= curtime and c.d >= 0 then
-                            Add(candidates,c);
-                        fi;
-                    od;
-                od;
-            fi;
-            Assert(1,candidates<>[],"No lift in LIFTARC -- I'm stymied\n");
-
-            if Length(candidates)>=2 then
-                # middle game: keep those candidates that project
-                # to something homotopic to gamma[curtime..intersect_time],
-                # namely that does not intersect domain's boundary (except maybe
-                # at its extremities
-                c := CHOOSEBYSUBDIVISION@(ratmap,lift.pos,curtime,gamma,candidates,curbdry,domain);
-            else
-                c := candidates[1];
-            fi;
-            
-            if IsBound(c.cell) then # "to" cell: done!
-                i := lift.elt;
-                lift := ShallowCopy(Remove(toface[curface.index],POSITIONID@(toface[curface.index],c)));
-                lift.elt := i;
-                break;
-            fi;
-            
-            i := lift.elt;
-            # if we're parallel to an edge, maybe move back to the previous cell
-            if not IsIdenticalObj(c.e.left,curface) then
-                Error("This code is not yet tested @@");
-                i := i / lift.e.gpelement;
-            fi;
-            lift := c;
-            lift.elt := i * lift.e.gpelement;
-            curface := lift.e.right;
-
-            # if at a vertex, allow time to go back a little, in case the
-            # edges don't really match
-            if lift.u < EPS@.eps or lift.u > MACFLOAT_1-EPS@.eps then
-                curtime := lift.t - 10*MACFLOAT_EPS;
-            else
-                curtime := lift.t;
-            fi;
-            c.t := -2*MACFLOAT_1; # mark it, and its reverse, as unusable
-            c.reverse.t := -2*MACFLOAT_1;
-        until false;
-        Add(lifts,lift);
-    od;
-    return lifts;
-end);
-
-BindGlobal("LIFTEDGE@", function(spider,ratmap,from,to,edge)
-    # lifts the arc perpendicular to <edge> through <ratmap>.
-    # <from> is a list of rec(pos := <p1point>, cell := <face>,
-    #     elt := <gpelement>), such that the <p1point> are the
-    #     preimages of edge.left.pos.
-    # <to> is a lift of rec(pos := <p1point>, cell := <face>), one per
-    #     preimage of e.right.pos.
-    # returns list <lifts> of length Degree(ratmap), where
-    #     <lifts>[i] is a rec(pos := <p1point>, cell := <face>,
-    #     elt := <gpelement>); this is a reordering of <to>,
-    #     such that from[i] continues to to[i], and
-    #     to[i].elt = from[i].elt * (product of edges crossed along the lift)
-    local mid;
-    
-    mid := List(P1PreImages(ratmap,edge.pos),y->rec(pos := y, cell := LOCATE@(spider!.cut,fail,y)[1]));
-    
-    mid := LIFTARC@(spider,ratmap,from,mid,P1Path(edge.left.pos,edge.pos),edge.left);
-    return LIFTARC@(spider,ratmap,mid,to,P1Path(edge.pos,edge.right.pos),edge.right);
-end);
-
-BindGlobal("LIFTSPIDER@", function(target,src,ratmap,poly)
-    # lifts all dual arcs in <src> through <ratmap>; rounds their endpoints
-    # to faces of <target>; and rewrites the generators of <src> as words
-    # in <target>'s group. <base> is a preferred starting face of <src>.
-    # returns [face,edge] where:
-    # face is a list of length Degree(ratmap), and contains lifts of faces,
-    # indexed by the faces of <src>
-    # face[i][j] is rec(pos, targetface, targetgpelt)
-    local face, f, e, i, j, todo, lifts, perm, state, p, s, base, idle;
-    
-    # first lift all face centres, and choose a face containing the lift
-    face := List(src!.cut!.f,x->List(P1PreImages(ratmap,x.pos),y->rec(pos := y, cell := LOCATE@(target!.cut,fail,y)[1])));
-    
-    # and choose a base point
-    if poly then
-        base := src!.cut!.v[Length(GeneratorsOfGroup(src!.group))].n[1].left; # some face touching infinity
-    else
-        base := src!.cut!.f[1];
-    fi;
-    for f in face[base.index] do
-        f.elt := One(target!.group);
-    od;
-    
-    # lift edges in the dual tree. If src!.cut!.f[i] lifts to points
-    # in target!.cut!.f[j_1]...target!.cut!.f[j_d], then face[i][k], for k=1..d,
-    # is a record (cell=j_k, elt=the word obtained by lifting the geodesic
-    # from the basepoint to j_i, pos=exact position of the endpoint).
-    todo := NewFIFO([base]);
-    for f in todo do
-        for e in f.n do
-            # face[index] is a list of rec(pos := <position in P1>,
-            #    cell := <cell in target>, and maybe elt := <group element>).
-            # if elt is not assigned, we haven't lifted the edge yet
-            if not src!.intree[e.index] and not IsBound(face[e.right.index][1].elt) then
-                face[e.right.index] := LIFTEDGE@(target,ratmap,face[f.index],face[e.right.index],e);
-                Add(todo,e.right);
-            fi;
-        od;
-    od;
-
-    # then lift edges cutting the tree; store group elements and permutations
-    # in [perm,state]
-    perm := [];
-    state := [];
-    for e in src!.treeedge do
-        lifts := LIFTEDGE@(target,ratmap,face[e.left.index],face[e.right.index],e);
-        p := [];
-        s := [];
-        for i in [1..Length(lifts)] do
-            j := PositionProperty(face[e.right.index],f->IsIdenticalObj(lifts[i].pos,f.pos));
-            Add(p,j);
-            Add(s,lifts[i].elt/face[e.right.index][j].elt);
-        od;
-        Add(perm,p);
-        Add(state,s);
-    od;
-
-    # lift points, if present -- this should give an approximation of the measure of maximal entropy
-    if IsBound(src!.points) then
-        target!.points := [];
-        for i in src!.points do
-            Add(target!.points, Random(P1PreImages(ratmap,i)));
-        od;
-    fi;
-
-    return [state,perm];
-end);
-
-BindGlobal("POSTCRITICALPOINTS@", function(f)
-    # return [poly,[critical points],[post-critical points],[transitions]]
-    # where poly=true/false says if there is a fixed point of maximal degree;
-    # it is then the last element of <post-critical points>
-    # critical points is a list of [point in P1,degree]
-    # post-critical points are points in P1
-    # post-critical graph is a list of [i,j,n] meaning pcp[i] maps to pcp[j]
-    # with local degree n>=1; or, if i<0, then cp[-i] maps to pcp[j].
-
-    local c, i, j, cp, pcp, n, deg, newdeg, poly, polypos,
-          transitions, src, dst;
-
-    deg := DegreeOfP1Map(f);
-    cp := List(P1MapCriticalPoints(f),x->[x,2]);
-    i := 1;
-    while i<=Length(cp) do
-        j := i+1;
-        while j<= Length(cp) do
-            if P1Distance(cp[i][1],cp[j][1])<EPS@.prec then
-                Remove(cp,j);
-                cp[i][2] := cp[i][2]+1;
-            else
-                j := j+1;
-            fi;
-        od;
-        i := i+1;
-    od;
-
-    poly := First([1..Length(cp)],i->cp[i][2]=deg and P1Distance(P1Image(f,cp[i][1]),cp[i][1])<EPS@.prec);
-    
-    pcp := [];
-    transitions := [];
-    n := 0;
-    for i in [1..Length(cp)] do
-        c := cp[i][1];
-        src := -i;
-        deg := cp[i][2];
-        repeat
-            c := P1Image(f,c);
-            j := PositionProperty(cp,x->P1Distance(c,x[1])<EPS@.prec);
-            if j<>fail then
-                c := cp[j][1];
-                newdeg := cp[j][2];
-            else
-                newdeg := 1;
-            fi;
-            dst := PositionProperty(pcp,d->P1Distance(c,d)<EPS@.prec);
-            if dst=fail then
-                if j=fail then
-                    Add(pcp,c);
-                else
-                    Add(pcp,cp[j][1]);
-                fi;
-                if RemInt(Length(pcp),100)=0 then
-                    Info(InfoFR,2,"Post-critical set contains at least ",Length(pcp)," points");
-                fi;
-                dst := Length(pcp);
-                Add(transitions,[src,dst,deg]);
-                n := n+1;
-                if IsInt(poly) and IsIdenticalObj(pcp[n],cp[poly][1]) then
-                    polypos := n;
-                    poly := true;
-                fi;
-            else
-                Add(transitions,[src,dst,deg]);
-                break;
-            fi;
-            deg := newdeg;
-            src := dst;
-        until false;
-    od;
-
-    if poly=fail then
-        poly := false;
-    else
-        Add(pcp,Remove(pcp,polypos)); # force infinity to be at end
-        for c in transitions do
-            for i in [1..2] do
-                if c[i]=polypos then
-                    c[i] := n;
-                elif c[i]>polypos then
-                    c[i] := c[i]-1;
-                fi;
-            od;
-        od;
-    fi;
-
-    return [poly,cp,pcp,transitions];
-end);
-
-BindGlobal("ATTRACTINGCYCLES@", function(pcdata)
-    local cycle, period, len, next, i, j, jj, periodic, critical;
-    
-    cycle := [];
-    next := [];
-    period := [];
-    for i in [1..Length(pcdata[3])] do
-        critical := false; periodic := false;
-        j := i; jj := i;
-        repeat
-            jj := First(pcdata[4],x->x[1]=jj)[2];
-            jj := First(pcdata[4],x->x[1]=jj)[2];
-            j := First(pcdata[4],x->x[1]=j)[2];
-        until j=jj;
-        len := 0;
-        repeat
-            len := len+1;
-            periodic := periodic or i=j;
-            j := First(pcdata[4],x->x[1]=j);
-            critical := critical or j[3]>1;
-            j := j[2];
-        until j=jj;
-        if critical and periodic then
-            Add(cycle,pcdata[3][i]);
-            Add(next,i);
-            Add(period,len);
-        fi;
-    od;
-    next := List(next,i->Position(next,First(pcdata[4],x->x[1]=i)[2])-1);
-    return TransposedMat([cycle,next,period]);
-end);
-
-BindGlobal("RAT2FRMACHINE@", function(f)
-    local i, poly, pcdata, pcp, spider, m;
-
-    if ValueOption("precision")<>fail then
-        EPS@.prec := ValueOption("precision");
-    else
-        EPS@.prec := Float(10^-5);
-    fi;
-
-    pcdata := POSTCRITICALPOINTS@(f);
-    poly := pcdata[1];
-    pcp := pcdata[3];
-    Info(InfoFR,2,"Post-critical points at ",pcdata[3]);
-
-    spider := TRIVIALSPIDER@(pcp);
-    m := LIFTSPIDER@(spider,spider,f,poly);
-    Add(m,spider);
-    Add(m,poly);
-    
-    spider!.map := f;
-    spider!.cycle := ATTRACTINGCYCLES@(pcdata);
-
-    return m;
-end);
-
-InstallMethod(FRMachine, "(FR) for a rational function",
-        [IsP1Map],
-        function(f)
-    local m, x;
-
-    x := RAT2FRMACHINE@(f);
-    m := FRMachine(x[3]!.model, x[1], x[2]);
-    SetSpider(m, x[3]);
-    SetRationalFunction(m,f);
-
-    return m;
-end);
-
-InstallMethod(FRMachine, "(FR) for a rational function",
-        [IsRationalFunction],
-        f->FRMachine(P1MapRational(f)));
-
-BindGlobal("IMGRECURSION@", function(to,from,trans,out,poly)
-    # <trans,out> describe a recursion from spider <from> to spider <to>;
-    # each line corresponds to a generator of <from>.group.
-    # if poly, then last generator is assumed to correspond to fixed element
-    # of maximal degree; put it in standard form.
-    # returns: [ <newtrans> <newout> ], where now
-    # each line corresponds to a generator of <from>.model, and each
-    # entry in <newtrans>[i] is an element of <to>.model.
-    local recur, r, j, v;
-    
-    recur := COMPOSERECURSION@(trans,out,from!.marking,to!.marking);
-    IMGOPTIMIZE@(recur[1], recur[2], SPIDERRELATOR@(to),false);
-    
-    if poly then
-        NORMALIZEADDINGMACHINE@(to!.model,recur[1],recur[2],Length(recur[1]),-1);
-        IMGOPTIMIZE@(recur[1], recur[2], SPIDERRELATOR@(to), false);
-        
-        # try to conjugate to simpler form, preserving the adder
-        v := Source(to!.marking).(Length(recur[1]));
-        v := REDUCEINNER@(Flat(recur[1]),[v,v^-1],NFFUNCTION@(to));
-    else
-        MARKTIME@(15);
-        v := REDUCEINNER@(Flat(recur[1]),GeneratorsOfMonoid(Source(to!.marking)),NFFUNCTION@(to));
-        MARKTIME@(16);    
-    fi;
-    if not IsOne(v) then
-        for r in recur[1] do for j in [1..Length(r)] do r[j] := r[j]^v; od; od;
-        IMGOPTIMIZE@(recur[1], recur[2], SPIDERRELATOR@(to), false);
-    fi;
-    return recur;
-end);
-
-InstallMethod(IMGMachine, "(FR) for a P1 map",
-        [IsP1Map],
-        function(f)
-    local x, m, spider, poly;
-
-    x := RAT2FRMACHINE@(f);
-    spider := x[3];
-    poly := x[4];
-    IMGMARKING@(spider,FreeGroup(Length(x[1])+1));
-    x := IMGRECURSION@(spider,spider,x[1],x[2],poly);
-
-    m := FRMachine(spider!.model, x[1], x[2]);
-    SetIMGRelator(m, SPIDERRELATOR@(spider));
-    SetSpider(m, spider);
-    SetRationalFunction(m, f);
-    if poly then
-        SetAddingElement(m,FRElement(m,spider!.model.(Length(x[1]))));
-    fi;
-
-    return m;
-end);
-
-InstallMethod(IMGMachine, "(FR) for a rational function",
-        [IsRationalFunction],
-        f->IMGMachine(P1MapRational(f)));
-##############################################################################
-
-#############################################################################
-##
-#M IMG Machine to Function
-##
-InstallMethod(IMGORDERING@, [IsIMGMachine],
-        function(M)
-    local w;
-    w := LetterRepAssocWord(IMGRelator(M));
-    if ForAny(w,IsNegInt) then w := -Reversed(w); fi;
-    while w[Length(w)]<>Length(w) do
-        Add(w,Remove(w,1));
-    od;
-    return w;
-end);
-
-InstallMethod(VERTICES@, [IsMarkedSphere],
-        function(spider)
-    # the vertices a spider lies on
-    return List(Filtered(spider!.cut!.v,v->not IsBound(v.fake)),v->v.pos);
-end);
-
-BindGlobal("STRINGTHETAPHI@", function(point)
-    return CONCAT@(ATAN2_MACFLOAT(point[2],point[1])," ",
-                   ACOS_MACFLOAT(point[3]));
-end);
-
-BindGlobal("SOLVE_HURWITZ@", function(d,v,c,f)
-    # d is list of degrees
-    # v is list of critical values, with last three (0,1,infinity) omitted
-    # c is approximation to critical points
-    # f is approximation to rational map
-    # returns [newc,newf] using Newton's method
-    local z, num, den, status, i, degree, d8;
-    
-    z := IndeterminateOfUnivariateRationalFunction(f);
-    num := ShallowCopy(CoefficientsOfUnivariatePolynomial(NumeratorOfRationalFunction(f)));
-    den := ShallowCopy(CoefficientsOfUnivariatePolynomial(DenominatorOfRationalFunction(f)));
-    c := ShallowCopy(c);
-    degree := (Sum(d)-Length(d))/2+1;
-    d8 := d[Length(d)];
-    if Length(num)=degree and Length(den)=degree-d8 then
-        i := Sqrt(d8*num[degree]*den[degree-d8]);
-        num := num/i; den := den/i;
-    fi;    
-    
-    status := FIND_RATIONALFUNCTION(d,v,c,num,den,[1000,EPS@.ratprec,EPS@.ratprec]);
-    
-    if status<>0 then
-        return status;
-    fi;
-    
-    for i in [1..Length(num)] do num[i] := CallFuncList(Complex,num[i]); od;
-    for i in [1..Length(den)] do den[i] := CallFuncList(Complex,den[i]); od;
-    
-    return [c,UnivariatePolynomial(COMPLEX_FIELD,num,z)/UnivariatePolynomial(COMPLEX_FIELD,den,z)];
-end);
-
-BindGlobal("RUNCIRCLEPACK@", function(values,perm,oldf,oldlifts)
-    local spider, s, output, f, i, j, p;
-
-    spider := TRIVIALSPIDER@(values);
-    IMGMARKING@(spider,FreeGroup(Length(values)));
-    f := GroupHomomorphismByImagesNC(spider!.model,SymmetricGroup(Length(perm[1])),GeneratorsOfGroup(spider!.model),List(perm,PermList));
-    s := "";
-    output := OUTPUTTEXTSTRING@(s);
-
-    PrintTo(output,"SLITCOUNT: ",Length(spider!.treeedge),"\n");
-    for i in spider!.treeedge do
-        PrintTo(output,STRINGTHETAPHI@(i.from.pos)," ",STRINGTHETAPHI@(i.to.pos),"\n");
-    od;
-
-    PrintTo(output,"\nPASTECOUNT: ",Length(spider!.treeedge)*Length(perm[1]),"\n");
-    for i in [1..Length(spider!.treeedge)] do
-        p := PreImagesRepresentative(spider!.marking,spider!.group.(i))^f;
-        for j in [1..Length(perm[1])] do
-            PrintTo(output,j," ",2*i-1," ",j^p," ",2*i,"\n");
-        od;
-    od;
-    Print(s);
-    CHECKEXEC@("mycirclepack");
-    output := "";
-    Process(DirectoryCurrent(), EXEC@.mycirclepack, InputTextString(s),
-            OUTPUTTEXTSTRING@(output), []);
-    Error("Interface to circlepack is not yet written. Contact the developers for more information. Output is ", output);
-end);
-
-BindGlobal("TRICRITICAL@", function(perm)
-    # find a rational function with critical values 0,1,infinity
-    # with monodromy actions perm[1],perm[2],perm[3]
-    # return fail if it's too hard to do;
-    # otherwise, return [map, critical points (on sphere),order],
-    # where order is a permutation of the critical values:
-    # ELM_LIST([0,1,infinity],order[i]) has permutation perm[i]
-    
-    # the cases covered are:
-    # [[a],[b],[c]], degree=(a+b+c-1)/2
-    # [[m,n],[m,n],[3]], degree=m+n
-    # [[2,3],[2,3],[2,2]], degree=5
-    # [[n,n],[2,...,2],[2,...,2]], degree=2n
-    # [[degree],[m,degree-m+1]]
-    # [[degree],[m,degree-m],[2]]
-    local deg, cl, i, j, k, m, points, f, order, p, z;
-
-    deg := Length(perm[1]);
-    perm := List(perm,PermList);
-    cl := List(perm,x->SortedList(CycleLengths(x,[1..deg])));
-    z := Indeterminate(COMPLEX_FIELD); # legacy
-    
-    points := [P1Point(0), P1Point(1), P1infinity];
-    
-    if ForAll(cl,x->Length(DifferenceLists(x,[1]))=1) then # [[a],[b],[c]]
-        cl := List(cl,x->DifferenceLists(x,[1])[1]);
-
-        m := List([0..deg-cl[2]],row->List([0..deg],col->(-1)^(col-row)*Binomial(cl[2],col-row)));
-        p := NullspaceMat(m{1+[0..deg-cl[2]]}{1+[deg-cl[3]+1..cl[1]-1]})[1];
-        p := [,p*Lcm(List(p,DenominatorRat))];
-        j := p[2]*m;
-        j := j / Gcd(j);
-        p[3] := -j{1+[0..deg-cl[3]]};
-        p[1] := j{1+[cl[1]..deg]};
-        for j in [1..3] do
-            p[j] := Sum([0..deg-cl[j]],i->p[j][1+i]*z^i);
-        od;
-        f := P1MapRational(z^cl[1]*p[1]/p[3]);
-        for j in [1..3] do
-            Append(points,List(ComplexRootsOfUnivariatePolynomial(p[j]),P1Point));
-        od;
-        return [f,points,[1,2,3]];
-    fi;
-    
-    if Size(Set(cl))<=2 and ForAll(cl,x->DifferenceLists(x,[1])=[3] or Length(x)=2) then # [m+n,m+n,3]
-        i := PositionProperty(cl,x->DifferenceLists(x,[1])=[3]);
-        m := cl[1+(i mod 3)];
-        f := P1MapRational(z^m[2]*((m[1]-m[2])*z+(m[1]+m[2]))^m[1]/((m[1]+m[2])*z+(m[1]-m[2]))^m[1]);
-        Add(points,P1Point((m[1]+m[2])/(m[2]-m[1])));
-        k := P1PreImages(f,P1Point(1));
-        SortParallel(List(k,x->P1Distance(x,P1Point(1))),k);
-        Append(points,k{[4..deg]});
-        if i=2 then order := [1,2,3]; else order := ListPerm((i,2),3); fi;
-        return [f,points,order];
-    fi;
-    
-    if deg=5 and IsEqualSet(cl,[[2,3],[1,2,2]]) then # (1,2)(3,4,5),(1,3)(2,5,4),(1,5)(2,3)
-        f := P1MapRational(z^3*((4*z+5)/(5*z+4))^2);
-        Add(points,P1Point(-4/5)); # to infinity
-        Add(points,P1Point(-5/4)); # to 0
-        Add(points,P1Point(-7/8,Sqrt(15*MACFLOAT_1)/8)); # to 1
-        Add(points,P1Point(-7/8,-Sqrt(15*MACFLOAT_1)/8)); # to 1
-        order := Permuted([1,3,2],(1,2,3)^Position(cl,[1,2,2]));
-        return [f,points,order];
-    fi;
-    
-    i := First([1..3],i->cl[i]=[deg/2,deg/2]);
-    if i<>fail and ForAll([1..3],j->i=j or Set(cl[j])=[2]) then
-        # deg = 2n; shapes [n,n],[2,...,2],[2,...,2]
-        f := P1MapRational(4*z^(deg/2)/(1+z^(deg/2))^2);
-        order := Permuted([3,2,1],(1,2,3)^i);
-        Remove(points,2); # remove 1
-        Append(points,List([0..deg-1],i->P1Point(EXP_COMPLEX(COMPLEX_2IPI*i/deg))));
-        return [f,points,order];
-    fi;
-    
-    i := First([1..3],i->cl[i]=[deg]); # max. cycle
-    if i=fail then return fail; fi; # now only accept polynomials
-    if Product(perm)=() then
-        j := i mod 3+1; k := j mod 3+1;
-    else
-        k := i mod 3+1; j := k mod 3+1;
-    fi;
-    
-    m := First([j,k],i->Length(cl[i])=2);
-    if m<>fail then # [d],[m,d-m], [2,1,...,1]
-        order := [m,j+k-m,i];
-        m := cl[m][1];
-        f := P1MapRational((z*deg/m)^m*((1-z)*deg/(deg-m))^(deg-m));
-        points := points{order};
-        Add(points,P1Point(m/deg));
-        i := P1PreImages(f,P1Point(1));
-        SortParallel(List(i,z->P1Distance(z,P1Point(m/deg))),i);
-        Append(points,i{[3..deg]});
-        return [f,points,order];
-    fi;
-    
-    m := Maximum(cl[j]);
-    if Set(cl[j])=[1,m] and Set(cl[k])=[1,deg-m+1] then
-        # so we know the action around i is (1,...,deg), at infinity
-        # the action around j is (m,m-1,...,1), at 0
-        # the action around k in (deg,deg-1...,m), at 1
-        f := P1MapRational(m*Binomial(deg,m)*Primitive(z^(m-1)*(1-z)^(deg-m)));
-        order := [j,k,i];
-        points := points{order};
-        for i in [0,1] do
-            j := P1PreImages(f,P1Point(i));
-            k := List(j,x->P1Distance(x,P1Point(i)));
-            SortParallel(k,j);
-            if i=0 then
-                j := j{[m+1..deg]};
-            else
-                j := j{[deg+2-m..deg]};
-            fi;
-            Append(points,List(j,P1Point));
-        od;
-        return [f,points,order];
-    fi;
-    
-    return fail;
-end);
-
-BindGlobal("QUADRICRITICAL@", function(perm,values)
-    local c, w, f, m, id, aut, z;
-    
-    # normalize values to be 0,1,infty,w
-    aut := CallFuncList(P1Map,values{[1..3]});
-    w := Complex(P1Image(aut^-1,values[4]));
-    
-    # which two values have same deck transformation?
-    id := First(Combinations(4,2),p->perm[p[1]]=perm[p[2]]);
-    
-    z := Indeterminate(COMPLEX_FIELD);
-    c := ComplexRootsOfUnivariatePolynomial((z-2)^3*z-w*(z+1)^3*(z-1));
-    
-    # find appropriate c
-    f := List(c,c->P1MapRational(z^2*(c*(z-1)+2-c)/(c*(z+1)-c)));
-    m := List(f,IMGMachine);
-    
-    f := aut*f[First([1..Length(c)],i->Output(m[i],id[1])=Output(m[i],id[2]))];
-    
-    return [f, [P1Point(0), P1Point(1), P1infinity,
-                P1Point(c*(c-2)/(c^2-1))]];
-end);
-
-BindGlobal("RATIONALMAP@", function(values,perm,oldf,oldlifts)
-    # find a rational map that has critical values at <values>, with
-    # monodromy action given by <perm>, a list of permutations (as lists).
-    # returns [map,points] where <points> is the full preimage of <values>
-    local cv, p, f, points, deg, i;
-    cv := Filtered([1..Length(values)],i->not ISONE@(perm[i]));
-    deg := Length(perm[1]);
-    if Length(cv)=2 then # bicritical
-        p := List(values{cv},P1POINT2C2);
-        f := CallFuncList(P1Map,values{cv})*P1MAPMONOMIAL@(deg);
-        points := [P1Point(0),P1infinity];
-    elif Length(cv)=3 then # tricritical
-        p := TRICRITICAL@(perm{cv});
-        if p<>fail then
-            f := CallFuncList(P1Map,ELMS_LIST(values{cv},p[3]))*p[1];
-            points := p[2];
-        fi;
-    elif deg=3 then # quadricritical, but degree 3
-        p := QUADRICRITICAL@(perm{cv},values{cv});
-        f := p[1];
-        points := p[2];
-    fi;
-
-    if not IsBound(points) then # run circlepack
-        p := RUNCIRCLEPACK@(values{cv},perm{cv},oldf,oldlifts);
-        Error(p);
-        f := fail;
-        points := fail;
-    fi;
-
-    for i in [1..Length(values)] do if not i in cv then
-        Append(points,P1PreImages(f,values[i]));
-    fi; od;
-    return [f,points];
-end);
-
-BindGlobal("MATCHPERMS@", function(M,q)
-    # find a bijection of [1..n] that conjugates M!.output[i] to q[i] for all i
-    local c, g, p;
-    g := SymmetricGroup(Length(q[1]));
-    p := List(GeneratorsOfGroup(StateSet(M)),g->PermList(Output(M,g)));
-    q := List(q,PermList);
-    c := RepresentativeAction(g,q,p,OnTuples);
-    return c;
-end);
-
-BindGlobal("MATCHTRANS@", function(M,recur,spider,v)
-    # match generators g[i] of M to elements of v.
-    # returns a list <w> of elements of <v> such that:
-    # if, in M, g[i]^N lifts to a conjugate of g[j] for some integer N, and
-    # through <recur> g[i]^N lifts to a conjugate of generator h[k], then
-    # set w[j] = v[k].
-    # it is in particular assumed that recur[1] has as many lines as
-    # StateSet(M) has generators; and that entries in recur[1][j] belong to a
-    # free group of rank the length of v.
-    local w, i, j, k, c, x, gensM, gensR;
-
-    gensM := GeneratorsOfGroup(StateSet(M));
-    gensR := List(GeneratorsOfGroup(spider!.model),x->x^spider!.marking);
-    w := [];
-
-    for i in [1..Length(gensM)] do
-        x := WreathRecursion(M)(gensM[i]);
-        Assert(0,x[2]=recur[2][i]);
-        for c in Cycles(PermList(x[2]),AlphabetOfFRObject(M)) do
-            j := CyclicallyReducedWord(Product(x[1]{c}));
-            k := CyclicallyReducedWord(Product(recur[1][i]{c})^spider!.marking);
-            if IsOne(j) then continue; fi;
-            j := Position(gensM,j);
-            k := PositionProperty(gensR,g->IsConjugate(spider!.group,k,g));
-            w[j] := v[k];
-        od;
-    od;
-    Assert(0,BoundPositions(w)=[1..Length(gensM)]);
-    return w;
-end);
-
-BindGlobal("NORMALIZINGMAP@", function(points,oldpoints)
-    # returns the (matrix of) Mobius transformation that sends v[n] to infinity,
-    # the barycenter to 0, and makes the new points as close as possible
-    # to oldpoints by a rotation fixing 0-infinity.
-    local map, prec, barycenter, dilate, start;
-
-    prec := MACFLOAT_EPS*2; # no sense in seeking more precision; maybe less?
-    start := [MACFLOAT_0,MACFLOAT_0,MACFLOAT_0];
-    while true do
-        barycenter := FIND_BARYCENTER(List(points,SphereP1),start,100,prec);
-        if IsString(barycenter) then
-            prec := 2*prec;
-            while prec>1/1000 do # this is hopeless. we got stuck.
-                Error("FIND_BARYCENTER returned '",barycenter,"'. Repent.");
-            od;
-        else
-            break;
-        fi;
-    od;
-    dilate := Sqrt(barycenter[1]^2);
-    if dilate = MACFLOAT_0 then
-        map := P1Identity;
-    else
-        map := P1ROTATION([P1Sphere(-barycenter[1]/dilate)],MACFLOAT_1-dilate);
-        points := List(points,p->P1Image(map,p));
-    fi;
-    return P1ROTATION(points,oldpoints)*map;
-end);
-
-BindGlobal("SPIDERDIST@", function(spiderA,spiderB,fast)
-    local model, points, perm, dist, recur, endo, nf, g;
-
-    model := spiderA!.model;
-
-    # try to match feet of spiderA and spiderB
-    points := VERTICES@(spiderA);
-    perm := VERTICES@(spiderB);
-    
-    perm := MATCHPOINTS@(perm,List(perm,x->points));
-    if perm=fail or Set(perm)<>[1..Length(points)] then # no match, find something coarse
-        return Sum(GeneratorsOfGroup(spiderA!.group),x->Length(PreImagesRepresentative(spiderA!.marking,x)^spiderB!.marking))/Length(points);
-    fi;
-    
-    
-    # move points of spiderB to their spiderA matches
-    spiderB := WIGGLESPIDER@(spiderB,points{perm});
-    dist := spiderB!.cut!.wiggled;
-    
-    if fast then # we just wiggled the points, the combinatorics didn't change
-        return dist/Length(points);
-    fi;
-    
-    recur := LIFTSPIDER@(spiderA,spiderB,P1Identity,false);
-
-    if Group(Concatenation(recur[1]))<>spiderA!.group then
-        Info(InfoFR,1,"The triangulation got messed up; cross your fingers");
-    fi;
-
-    endo := GroupHomomorphismByImagesNC(spiderB!.group,model,
-                    GeneratorsOfGroup(spiderB!.group),
-        List(recur[1],x->PreImagesRepresentative(spiderA!.marking,x[1])))*spiderB!.marking;
-
-    endo := List(GeneratorsOfGroup(spiderB!.group),x->x^endo);
-    REDUCEINNER@(endo,GeneratorsOfMonoid(spiderB!.group),x->x);
-    
-    for g in endo do
-        dist := dist + (Length(g)-1); # if each image is a gen, then endo=1
-    od;
-    return dist/Length(points);
-end);
-
-BindGlobal("PUSHRECURSION@", function(map,M)
-    # returns a WreathRecursion() function for Range(map), and not
-    # Source(map) = StateSet(M)
-    local w;
-    w := WreathRecursion(M);
-    return function(x)
-        local l;
-        l := w(PreImagesRepresentative(map,x));
-        return [List(l[1],x->Image(map,x)),l[2]];
-    end;
-end);
-
-BindGlobal("PULLRECURSION@", function(map,M)
-    # returns a WreathRecursion() function for Source(map), and not
-    # Range(map) = StateSet(M)
-    local w;
-    w := WreathRecursion(M);
-    return function(x)
-        local l;
-        l := w(Image(map,x));
-        return [List(l[1],x->PreImagesRepresentative(map,x)),l[2]];
-    end;
-end);
-
-BindGlobal("PERRONMATRIX@", function(mat)
-    local i, j, len;
-    # find if there's an eigenvalue >= 1, without using numerical methods
-
-    len := Length(mat);
-    if NullspaceMat(mat-IdentityMat(len))=[] then # no 1 eigenval
-        i := List([1..len],i->1);
-        j := List([1..len],i->1); # first approximation to perron-frobenius vector
-        repeat
-            i := i*mat;
-            j := j*mat*mat; # j should have all entries growing exponentially
-            if ForAll([1..len],a->j[a]=0 or j[a]<i[a]) then
-                return false; # perron-frobenius eigenval < 1
-            fi;
-        until ForAll(j-i,IsPosRat);
-    fi;
-    return true;
-end);
-
-BindGlobal("SURROUNDINGCURVE@", function(t,x)
-    # returns a CCW sequence of edges disconnecting x from its complement in t.
-    # x is a sequence of indices of vertices. t is a triangulation.
-    local starte, a, c, v, e, i;
-
-    starte := First(t!.e,j->j.from.index in x and not j.to.index in x);
-    v := starte.from;
-    a := [starte.left.pos];
-    c := [];
-    i := POSITIONID@(v.n,starte);
-    repeat
-        i := i+1;
-        if i > Length(v.n) then i := 1; fi;
-        e := v.n[i];
-        if e.to.index in x then
-            v := e.to;
-            e := e.reverse;
-            i := POSITIONID@(v.n,e);
-        else
-            Add(c,e);
-            Add(a,e.pos);
-            Add(a,e.left.pos);
-        fi;
-    until IsIdenticalObj(e,starte);
-    return [a,c];
-end);
-
-BindGlobal("FINDOBSTRUCTION@", function(M,multicurve,spider,boundary)
-    # search for an obstruction starting with the elements of M.
-    # return fail or a record describing the obstruction.
-    # spider and boundary may be "fail".
-    local len, w, x, mat, row, i, j, c, d, group, pi, gens, peripheral;
-
-    len := Length(multicurve);
-    gens := GeneratorsOfGroup(StateSet(M));
-    group := FreeGroup(Length(gens)-1);
-    c := IMGRelator(M);
-    pi := GroupHomomorphismByImagesNC(StateSet(M),group,List([1..Length(gens)],i->Subword(c,i,i)),Concatenation(GeneratorsOfGroup(group),[Product(List(Reversed(GeneratorsOfGroup(group)),Inverse))]));
-
-    w := PUSHRECURSION@(pi,M);
-
-    peripheral := List(GeneratorsOfSemigroup(StateSet(M)),x->CyclicallyReducedWord(x^pi));
-    multicurve := List(multicurve,x->CyclicallyReducedWord(x^pi));
-    mat := [];
-    for i in multicurve do
-        d := w(i);
-        row := List([1..len],i->0);
-        for i in Cycles(PermList(d[2]),AlphabetOfFRObject(M)) do
-            c := CyclicallyReducedWord(Product(d[1]{i}));
-            if ForAny(peripheral,x->IsConjugate(group,x,c)) then
-                continue; # peripheral curve
-            fi;
-            j := First([1..len],j->IsConjugate(group,c,multicurve[j])
-                       or IsConjugate(group,c^-1,multicurve[j]));
-            if j=fail then # add one more curve
-                for j in mat do Add(j,0); od;
-                Add(row,1/Length(i));
-                len := len+1;
-                Add(multicurve,c);
-            else
-                row[j] := row[j] + 1/Length(i);
-            fi;
-        od;
-        Add(mat,row);
-    od;
-
-    Info(InfoFR,2,"Thurston matrix is ",mat);
-
-    x := List(EquivalenceClasses(StronglyConnectedComponents(BinaryRelationOnPoints(List([1..len],x->Filtered([1..len],y->IsPosRat(mat[x][y])))))),Elements);
-    for i in x do
-        if PERRONMATRIX@(mat{i}{i}) then # there's an eigenvalue >= 1
-            d := rec(machine := M,
-                     obstruction := [],
-                     matrix := mat{i}{i});
-            if spider<>fail then
-                d.spider := spider;
-            fi;
-            for j in i do
-                if spider<>fail and IsBound(boundary[j]) then
-                    if not IsBound(spider!.arcs) then spider!.arcs := []; fi;
-                    Add(spider!.arcs,[[0,0,255],Float(105/100),boundary[j][1]]);
-                fi;
-                c := [PreImagesRepresentative(pi,multicurve[j])];
-                if spider<>fail then
-                    REDUCEINNER@(c,GeneratorsOfMonoid(StateSet(M)),NFFUNCTION@(spider));
-                fi;
-                Append(d.obstruction,c);
-            od;
-            return d;
-        fi;
-    od;
-    return fail;
-end);
-
-InstallOtherMethod(FindThurstonObstruction, "(FR) for a list of IMG elements",
-#        [IsIMGElementCollection], !method selection doesn't work!
-        [IsFRElementCollection],
-        function(elts)
-    local M;
-    M := UnderlyingFRMachine(elts[1]);
-    while not IsIMGMachine(M) or ForAny(elts,x->not IsIdenticalObj(M,UnderlyingFRMachine(x))) do
-        Error("Elements do not all have the same underlying IMG machine");
-    od;
-    return FINDOBSTRUCTION@(M,List(elts,InitialState),fail,fail);
-end);
-
-BindGlobal("SPIDEROBSTRUCTION@", function(spider,M)
-    # check if <spider> has coalesced points; in that case, read the
-    # loops around them and check if they form an obstruction
-    local multicurve, boundary, i, j, c, d, x, w;
-
-    # construct a list <x> of (lists of vertices that coalesce)
-    w := VERTICES@(spider);
-    x := Filtered(Combinations([1..Length(w)],2),p->P1Distance(w[p[1]],w[p[2]])<EPS@.obst);
-    x := EquivalenceClasses(EquivalenceRelationByPairs(Domain([1..Length(w)]),x));
-    x := Filtered(List(x,Elements),c->Size(c)>1);
-    if x=[] then
-        return fail;
-    fi;
-
-    # replace each x by its conjugacy class
-    multicurve := [];
-    boundary := [];
-    for i in x do
-        c := One(spider!.group);
-        for j in TREEBOUNDARY@(spider) do
-            if (not j.from.index in i) and j.to.index in i then
-                c := c*j.gpelement;
-            fi;
-        od;
-        Add(multicurve,c);
-        Add(boundary,SURROUNDINGCURVE@(spider!.cut,i));
-
-    od;
-    Info(InfoFR,2,"Testing multicurve ",multicurve," for an obstruction");
-
-    return FINDOBSTRUCTION@(M,List(multicurve,x->PreImagesRepresentative(spider!.marking,x)),spider,boundary);
-end);
-
-BindGlobal("P1MAPMINUSZ@", P1MapSL2([[-1,0],[0,1]]));
-
-BindGlobal("NORMALIZEV@", function(f,n,uni)
-    local p, i, j, k, a, b, mobius, m, coeff, degree, numer, denom;
-    p := POSTCRITICALPOINTS@(f);
-    degree := DegreeOfP1Map(f);
-    
-    while Length(p[2])>2 do
-        Error("The map is not bicritical, I don't know how to normalize it");
-    od;
-    
-    if n=0 then # force critical points at 0, infty; make first other point 1
-        j := First(p[3],z->not IsIdenticalObj(z,p[2][1][1]) and not IsIdenticalObj(z,p[2][2][1]));
-        if j=fail then # no other point; then map is z^{\pm degree}
-            if p[1] then
-                return P1MAPMONOMIAL@(degree);
-            else
-                return P1MAPMONOMIAL@(-degree);
-            fi;
-        fi;
-        mobius := P1Map(p[2][1][1],j,p[2][2][1]);
-    else
-        for i in [1..2] do
-            j := [First(p[4],r->r[1]=-i)[2]];
-            for k in [1..n] do
-                j[k+1] := First(p[4],r->r[1]=j[k])[2];
-            od;
-            if j[n+1]=j[1] and not j[1] in j{[2..n]} then j := j[1]; break; fi;
-        od;
-        while not IsInt(j) do
-            Error("I couldn't find a cycle of length ",n);
-        od;
-        if n=1 then # map marked point to infty, unmarked to 0, 0=>1
-            if Length(p[3])=2 then
-                return P1MAPMONOMIAL@(degree);
-            fi;
-            j := First(p[4],r->r[1]=i-3)[2];
-            mobius := P1Map(p[2][3-i][1],p[3][j],p[2][i][1]);
-        elif n=2 then # normalize as a/(z^2+2z), infty=>0->infty, -1=>
-            if Length(p[3])=2 then # special case infty=>0=>infty or polynomial
-                if First(p[4],r->r[1]=j)[2]=j then
-                    return P1MAPMONOMIAL@(degree);
-                else
-                    return P1MAPMONOMIAL@(-degree);
-                fi;
-            fi;
-            mobius := P1Map(p[3][j],p[2][3-i][1],p[2][i][1])*P1MAPMINUSZ@;
-        else # normalize as 1+a/z+b/z^2, 0=>infty->1
-            k := First(p[4],r->r[1]=j)[2];
-            mobius := P1Map(p[2][i][1],p[3][k],p[3][j]);
-        fi;
-    fi;
-    f := CleanedP1Map(mobius^-1*f*mobius,EPS@.prec);
-    numer := List([0..degree],i->COMPLEX_0);
-    denom := List([0..degree],i->COMPLEX_0);
-    if n=1 and uni then # force z^d+c and not az^d+1
-        coeff := CoefficientsOfP1Map(f);
-        if ForAll([2..degree],j->IsZero(coeff[1][j])) and ForAll([2..degree+1],j->IsZero(coeff[2][j])) then
-            numer[1] := coeff[1][degree+1]^(1/(degree-1));
-            numer[degree+1] := COMPLEX_1;
-            denom[1] := COMPLEX_1;
-            f := CleanedP1Map(P1MapByCoefficients(numer,denom),EPS@.prec);
-        else
-            Error("Cannot normalize to z^d+c");
-        fi;
-    elif n=2 and degree=2 then
-        coeff := CoefficientsOfP1Map(f);
-        if IsZero(coeff[1][2]) and IsZero(coeff[1][3]) and IsZero(coeff[2][1]) and AbsoluteValue(coeff[2][3]-1/2)<EPS@.ratprec then
-            numer[1] := coeff[1][1]*2; # numerator is A
-            denom[2] := COMPLEX_1; # denominator is z+z^2/2, off by 2 now
-            denom[3] := COMPLEX_1/2;
-            f := CleanedP1Map(P1MapByCoefficients(numer,denom),EPS@.prec);
-            coeff := CoefficientsOfP1Map(f);
-            f := P1MapByCoefficients(coeff[1],2*coeff[2]);
-        else
-            Error("Cannot normalize to A/(z^2+2z)");
-        fi;
-    elif n=3 then # special cleanup, force 1+a+b=0
-        coeff := CoefficientsOfP1Map(f);
-        if AbsoluteValue(Sum(coeff[1]))<EPS@.ratprec and AbsoluteValue(coeff[1][3]-1)<EPS@.ratprec then
-            numer[1] := coeff[1][1];
-            numer[2] := -numer[1]-COMPLEX_1;
-            numer[3] := COMPLEX_1;
-            denom[3] := COMPLEX_1;
-            f := P1MapByCoefficients(numer,denom);
-        else
-            Error("Cannot normalize to (A+(-1-A)z+z^2)/z^2");
-        fi;
-    fi;
-    return f;
-end);
-
-BindGlobal("EQUIDISTRIBUTEDPOINTS@", function(N)
-    # creates a list of N points equidistributed on the sphere
-    local t, x, p, r;
-
-    p := [];
-
-    while Length(p)<Minimum(N,10) do # add a little randomness
-        x := List([1..3],i->Random([-10^5..10^5]));
-        if x<>[0,0,0] then # that would be VERY unlucky
-            Add(p,P1Sphere(MACFLOAT_1*x));
-        fi;
-    od;
-    if Length(p)=N then return p; fi;
-    
-    t := DelaunayTriangulation(p);
-    r := MACFLOAT_PI/2;
-    while Length(t!.v)<N do
-        p := First(t!.f,x->x.radius>=r);
-        if p=fail then r := r*3/4; continue; fi;
-        ADDTOTRIANGULATION@(t,p.centre);
-        for x in t!.f do
-            if not IsBound(x.radius) then
-                p := CallFuncList(P1Circumcentre,List(x.n,e->e.from.pos));
-                x.centre := p[1];
-                x.radius := p[2];
-            fi;
-        od;
-    od;
-    return List(t!.v,x->x.pos);
-end);
-
-BindGlobal("FRMACHINE2RAT@", function(M)
-    local oldspider, spider, t, gens, n, deg, model,
-          f, mobius, match, v, i, j, recf, recmobius, map,
-          dist, obstruction, lifts, sublifts, fast;
-
-    if ValueOption("precision")<>fail then
-        EPS@.prec := ValueOption("precision");
-    fi;
-    if ValueOption("obstruction")<>fail then
-        EPS@.obst := ValueOption("obstruction");
-    fi;
-
-    model := StateSet(M);
-    gens := GeneratorsOfGroup(model);
-    n := Length(gens);
-    deg := Length(AlphabetOfFRObject(M));
-    
-    if n=2 then # special handling, space is not hyperbolic
-        i := Sum(List(Transitions(M,1),ExponentSums));
-        if i[1]-i[2]=1 then
-            return P1MAPMONOMIAL@(deg);
-        elif i[1]-i[2]=-1 then
-            return P1MAPMONOMIAL@(-deg);
-        else
-            Error(M," is not an IMG machine");
-        fi;
-    fi;    
-    
-    # create spider on equidistributed points on Greenwich meridian.
-    # its spanning tree will be consecutive edges from infty to 1,
-    # and so its IMG ordering is predictably that of M
-    v := [];
-    for i in [0..n-1] do
-        i := MACFLOAT_PI*i/n; # on positive real axis, tending to infinity
-        Add(v,P1Sphere([SIN_MACFLOAT(i),MACFLOAT_0,COS_MACFLOAT(i)]));
-    od;
-    v := Permuted(v,PermList(IMGORDERING@(M)));
-    spider := TRIVIALSPIDER@(v);
-    IMGMARKING@(spider,model);
-
-    if ValueOption("julia")<>fail then
-        i := ValueOption("julia");
-        if not IsInt(i) then i := 1000; fi; # number of points to trace
-        spider!.points := EQUIDISTRIBUTEDPOINTS@(i);
-    fi;
-    
-    lifts := fail;
-    f := fail; # in the beginning, we don't know them
-    fast := false;
-MARKTIME@(0); # set counters
-    repeat
-        oldspider := spider;
-        # find a rational map that has the right critical values
-        f := RATIONALMAP@(VERTICES@(spider),List(gens,g->Output(M,g)),f,lifts);
-        lifts := f[2]; f := f[1];
-        Info(InfoFR,3,"1: found rational map ",f," on vertices ",lifts);
-
-        if fast then # just get points closest to those in spider t
-            match := MATCHPOINTS@(sublifts,List(sublifts,x->lifts));
-            if match=fail then
-		Info(InfoFR,3,"1.5: back to slow mode");
-                fast := false; continue;
-            fi;
-            sublifts := lifts{match};
-        else
-            # create a spider on the full preimage of the points of <spider>
-            t := TRIVIALSPIDER@(lifts);
-            IMGMARKING@(t,FreeGroup(Length(lifts)));
-            Info(InfoFR,3,"2: created liftedspider ",t);
-
-            # lift paths in <spider> to <t>
-            recf := LIFTSPIDER@(t,spider,f,false);
-            if recf=fail then return fail; fi;
-            recf := IMGRECURSION@(t,spider,recf[1],recf[2],false);
-            Assert(1, CHECKREC@(recf,spider!.ordering,NFFUNCTION@(t)));
-            Info(InfoFR,3,"3: recursion ",recf);
-            
-            # find a bijection between the alphabets of <recf> and <M>
-            match := MATCHPERMS@(M,recf[2]);
-            if match=fail then return fail; fi;
-            
-            REORDERREC@(recf,match);
-            Info(InfoFR,3,"4: alphabet permutation ",match);
-
-            # extract those vertices in <v> that appear in the recursion
-            sublifts := MATCHTRANS@(M,recf,t,lifts);
-            Info(InfoFR,3,"5: extracted and sorted vertices ",sublifts);
-        fi;
- 
-        # find a mobius transformation that normalizes <sublifts> wrt PSL2C
-        mobius := NORMALIZINGMAP@(sublifts,VERTICES@(spider));
-        Info(InfoFR,3,"6: normalize by mobius map ",mobius);
-
-        # now create the new spider on the image of these points
-        v := List(sublifts,p->P1Image(mobius,p));
-        
-	if fast then
-            dist := Sum([1..Length(v)],i->P1Distance(VERTICES@(spider)[i],v[i]));
-            if dist>EPS@.fast*Length(v) then
-                fast := false;
-                Info(InfoFR,3,"7: legs moved ",dist,"; back to slow mode");
-                spider := oldspider;
-                continue; # restart
-            fi;
-            # just wiggle spider around
-            spider := WIGGLESPIDER@(spider,v);
-        else
-            spider := TRIVIALSPIDER@(v);
-            recmobius := LIFTSPIDER@(spider,t,mobius^-1,false);
-            if recmobius=fail then
-                return fail;
-            else
-                recmobius := recmobius[1];
-            fi;
-            Info(InfoFR,3,"7: new spider ",spider," with recursion ",recmobius);
-
-            # compose recursion of f with that of mobius
-            map := t!.marking*GroupHomomorphismByImagesNC(t!.group,spider!.group,GeneratorsOfGroup(t!.group),List(recmobius,x->x[1]));
-            for i in recf[1] do
-                for j in [1..Length(i)] do i[j] := i[j]^map; od;
-            od;
-            Info(InfoFR,3,"8: composed recursion is ",recf);
-                   
-            # finally set marking of new spider using M
-            spider!.model := model;
-            spider!.ordering := oldspider!.ordering;
-            spider!.marking := MATCHMARKINGS@(M,spider!.group,recf);
-            Assert(1, CHECKREC@(recf,spider!.ordering,NFFUNCTION@(t)));
-            Assert(1,CHECKSPIDER@(spider));
-            Info(InfoFR,3,"9: marked new spider ",spider);
-        fi;
-        
-        dist := SPIDERDIST@(spider,oldspider,fast);
-        Info(InfoFR,2,"Spider moved ",dist," steps; feet=",VERTICES@(spider)," marking=",spider!.marking);
-
-        if dist<EPS@.ratprec then
-            if fast then # force one last run with the full algorithm
-                fast := false;
-                continue;
-            fi;
-            f := CleanedP1Map(f*mobius^-1,EPS@.prec);
-            i := LIFTSPIDER@(spider,spider,f,false);
-            #!!! check that i is really the same as M
-            for i in spider!.cut!.v do
-                i.pos := CleanedP1Point(i.pos,EPS@.prec);
-            od;
-            break;
-        elif dist<EPS@.fast then
-            fast := true;
-        else
-            fast := false;
-        fi;
-        obstruction := SPIDEROBSTRUCTION@(spider,M);
-        if obstruction<>fail then
-            return obstruction;
-        fi;
-    until false;
-    
-    Info(InfoFR,2,"Spider converged");
-    
-    if ValueOption("param_bicritical")<>fail then
-        f := NORMALIZEV@(f,0,false);
-    elif ValueOption("param_unicritical")<>fail then
-        f := NORMALIZEV@(f,1,true);
-    elif IsPosInt(ValueOption("param_v")) then
-        f := NORMALIZEV@(f,ValueOption("param_v"),false);
-    fi;
-    
-    # construct a new machine with simpler recursion
-    for i in recf[1] do
-        for j in [1..Length(i)] do
-            i[j] := PreImagesRepresentative(spider!.marking,i[j]);
-        od;
-    od;
-    IMGOPTIMIZE@(recf[1], recf[2], SPIDERRELATOR@(spider),false);
-    t := FRMachine(model, recf[1], recf[2]);
-    SetIMGRelator(t, SPIDERRELATOR@(spider));
-    
-    # we should "untwist" by seeking a
-    # free group automorphism that "untwists" far more spider!.marking
-    # !!! keep track of the markings, and set them as SetCorrespondence(t, ...)
-    # !!! this machine does not seem to be much simpler than the original one
-    
-    spider!.map := f;
-    spider!.cycle := ATTRACTINGCYCLES@(POSTCRITICALPOINTS@(f));
-                     
-    return [f,t,spider];
-end);
-
-InstallMethod(P1Map, "(FR) for an IMG machine",
-        [IsIMGMachine],
-        M->FRMACHINE2RAT@(M)[1]);
-
-InstallMethod(RationalFunction, "(FR) for an IMG machine",
-        [IsIMGMachine],
-        M->RationalFunction(Indeterminate(COMPLEX_FIELD,"z":old),M));
-
-InstallMethod(RationalFunction, "(FR) for an indeterminate and an IMG machine",
-        [IsRingElement,IsIMGMachine],
-        function(z,M)
-    local data, f;
-    data := FRMACHINE2RAT@(M);
-    if not IsList(data) then return data; fi;
-    f := RationalP1Map(z,data[1]);
-    SetIMGMachine(f,data[2]);
-    SetSpider(f,data[3]);
-    return f;
-end);
-#############################################################################
-
-#E triangulations.g . . . . . . . . . . . . . . . . . . . . . . . . ends here
diff --git a/sandbox/wittner/airplane-12 b/sandbox/wittner/airplane-12
deleted file mode 100644
index cd067e1..0000000
--- a/sandbox/wittner/airplane-12
+++ /dev/null
@@ -1,12154 +0,0 @@
-# gnuplot data -- maxpcset=12 type=airplane
--5.032220152	0.0141514461	1/4096	0.000244141
--5.0267786386	0.0181719558	1/4094	0.00024426
--5.0274620869	0.0159872277	1/4092	0.000244379
--5.0278108999	0.0146430799	1/4088	0.000244618
--5.028044698	0.013572287	1/4080	0.000245098
--5.0282260175	0.0125604231	1/4064	0.000246063
--5.0283789749	0.0114526781	1/4032	0.000248016
--5.028510066	0.0100355183	1/3968	0.000252016
--5.028602601	0.0077908431	1/3840	0.000260417
--5.0272509112	0	1/3584	0.000279018
--4.997751333	0.018259904	1/2048	0.000488281
--4.971254514	0.0069648201	3/4096	0.000732422
--4.96933898	0.0097168633	3/4094	0.00073278
--4.9691279919	0.0084774072	1/1364	0.000733138
--4.9689964184	0.0076611728	3/4088	0.000733855
--4.9688844104	0.0069472392	1/1360	0.000735294
--4.9687660292	0.0061769219	3/4064	0.000738189
--4.9686133419	0.0051420042	1/1344	0.000744048
--4.9683660524	0.0031529323	3/3968	0.000756048
--4.9519375824	0	3/3584	0.000837054
--4.9527867568	0.0241060931	1/1024	0.000976562
--4.930179967	0.0055883028	5/4096	0.0012207
--4.9279369381	0.0067580756	5/4094	0.0012213
--4.9281875377	0.0058644467	5/4092	0.0012219
--4.928339138	0.0052410188	5/4088	0.00122309
--4.9284634255	0.0046535512	1/816	0.00122549
--4.9285888112	0.0039469099	5/4064	0.00123031
--4.9287412985	0.0027880229	5/4032	0.00124008
--4.9267332124	0	5/3968	0.00126008
--4.914715197	0	5/3584	0.00139509
--4.9167158271	0.0092284155	3/2048	0.00146484
--4.895881375	0.008705941	7/4096	0.00170898
--4.8954236873	0.0122682122	7/4094	0.00170982
--4.8944029779	0.0113082594	7/4092	0.00171065
--4.8936277989	0.0105823645	1/584	0.00171233
--4.8928030559	0.0098253764	7/4080	0.00171569
--4.8915769924	0.008746252100000001	7/4064	0.00172244
--4.8866631779	0.0058888798	1/576	0.00173611
--4.8838238122	0.0137356876	7/3968	0.00176411
--4.8844072325	0.0197249758	7/3840	0.00182292
--4.8925833929	0.0327007297	1/512	0.00195312
--4.874512044	0.0116192915	9/4096	0.00219727
--4.8713784056	0.0105864157	9/4094	0.00219834
--4.8723818485	0.009821843	3/1364	0.00219941
--4.8731490782	0.009199425900000001	9/4088	0.00220157
--4.873969761	0.0084897766	3/1360	0.00220588
--4.8751955066	0.0073305717	9/4064	0.00221457
--4.8768695292	0	1/448	0.00223214
--4.8698067325	0	9/3968	0.00226815
--4.8601536165	0.0076737481	5/2048	0.00244141
--4.856711312	0	9/3584	0.00251116
--4.848543594	0.0030564123	11/4096	0.00268555
--4.8475259121	0.0042558819	11/4094	0.00268686
--4.8473704672	0.0036127922	1/372	0.00268817
--4.8472655798	0.0031188246	11/4088	0.0026908
--4.8471651199	0.0025763726	11/4080	0.00269608
--4.8470378525	0.0016969148	11/4064	0.00270669
--4.8450011846	0	11/4032	0.00272817
--4.8416354243	0	11/3968	0.00277218
--4.8369334659	0.0086069079	11/3840	0.00286458
--4.8417112351	0.0125715116	3/1024	0.00292969
--4.8324854484	0	11/3584	0.0030692
--4.823786215	0.004755259	13/4096	0.00317383
--4.8217837204	0.0058998596	13/4094	0.00317538
--4.821865463	0.0049595021	13/4092	0.00317693
--4.8219194902	0.0042169339	13/4088	0.00318004
--4.8219689493	0.0033591081	13/4080	0.00318627
--4.822026835	0.0017472702	13/4064	0.00319882
--4.818744594	0	13/4032	0.00322421
--4.8148787957	0	13/3968	0.00327621
--4.8064305872	0.0114324049	13/3840	0.00338542
--4.8120816271	0.0120040909	7/2048	0.00341797
--4.7924199346	0.0279859651	13/3584	0.00362723
--4.797275592	0.0272883068	15/4096	0.00366211
--4.7987342423	0.0294853343	15/4094	0.0036639
--4.7976268504	0.0295065972	5/1364	0.00366569
--4.7967368261	0.0295448444	15/4088	0.00366928
--4.79566162	0.0296566694	1/272	0.00367647
--4.7936534671	0.0305740777	15/4064	0.00369094
--4.7930475453	0.0337936538	5/1344	0.00372024
--4.7943887657	0.0384611322	15/3968	0.00378024
--4.8093729716	0.0458357112	1/256	0.00390625
--4.787196598	0.0306560024	17/4096	0.00415039
--4.7860704779	0.0282054577	17/4094	0.00415242
--4.7871567792	0.0283515459	17/4092	0.00415445
--4.7880434472	0.0284205346	17/4088	0.00415851
--4.7891300139	0.0284089552	1/240	0.00416667
--4.79118167	0.0276143423	17/4064	0.00418307
--4.7924199346	0.0279859651	15/3584	0.00418527
--4.791954363	0.0245789796	17/4032	0.00421627
--4.7915956231	0.0199057346	17/3968	0.00428427
--4.7811712448	0.0171953952	9/2048	0.00439453
--4.7810893024	0.0105277698	17/3840	0.00442708
--4.769657399	0.0036552304	19/4096	0.00463867
--4.7680991657	0.0047291457	19/4094	0.00464094
--4.7680508912	0.0039052744	19/4092	0.00464321
--4.7680125179	0.0032061751	19/4088	0.00464775
--4.7679674191	0.0022784808	19/4080	0.00465686
--4.7664670296	0	19/4064	0.0046752
--4.7634440535	0	19/4032	0.0047123
--4.7596932283	-1e-10	17/3584	0.0047433
--4.7574015532	0.0047440451	19/3968	0.00478831
--4.7606063579	0.0109332234	5/1024	0.00488281
--4.7560517924	0.0065898034	19/3840	0.00494792
--4.749684481	0.0025155199	21/4096	0.00512695
--4.7484984047	0.0028530436	21/4094	0.00512946
--4.7486265073	0.002348746	7/1364	0.00513196
--4.748718792	0.0019047894	3/584	0.00513699
--4.7488163929	0.0012743717	7/1360	0.00514706
--4.74778806	0	21/4064	0.00516732
--4.7433297082	0	21/3968	0.00529234
--4.7422254129	0	19/3584	0.00530134
--4.7436198246	0.0042281585	11/2048	0.00537109
--4.732596276	0.0046688504	23/4096	0.00561523
--4.7321220464	0.006810854	1/178	0.00561798
--4.7312979125	0.0062086131	23/4092	0.00562072
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-0.2783506199	0.6165612244	901/4096	0.219971
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-0.2809944584	0.6195104704	901/4094	0.220078
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--0.0033006741	0.8853082692000001	1033/4064	0.254183
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-9.2869631067	-2.3625332445	1237/4080	0.303186
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-7.5070836671	0	79/256	0.308594
-7.5070688459	0	421/1364	0.308651
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-9.9854163816	0.5954820578	713/1024	0.696289
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-0.0234274524	-1.1779036702	327/448	0.729911
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--0.1552265439	-0.8524042026	375/512	0.732422
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--0.08920262900000001	-0.8532498868	91/124	0.733871
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--0.1075423414	-0.8077084619	2631/3584	0.734096
--0.0946460801	-0.8039417457	3001/4088	0.7341
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--0.0088529695	-0.9278021914	1527/2048	0.745605
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-0.0578993513	-0.9895837598	3139/4064	0.772392
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-0.0655031562	-0.9950076356000001	791/1024	0.772461
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-0.1113313407	-0.9848692897	1055/1364	0.77346
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-0.1100234768	-1.0727734963	2775/3584	0.774275
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-0.0902402353	-1.1162718748	793/1024	0.774414
-0.0896406479	-1.1154341032	3169/4092	0.774438
-0.0885174331	-1.1191358226	3073/3968	0.774446
-0.0711390747	-1.1322619327	3171/4094	0.774548
-0.1111229332	-1.115405043	3173/4096	0.774658
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-0.1100234768	-1.0727734963	2777/3584	0.774833
-0.1431222607	-1.0788717839	3149/4064	0.774852
-0.1511342067	-1.0687816077	1587/2048	0.774902
-0.1501783424	-1.0672516248	1057/1364	0.774927
-0.1524277336	-1.0706069501	3075/3968	0.77495
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-0.1735252897	-1.108827113	3125/4032	0.77505
-0.2398483503	-1.077113172	3175/4096	0.775146
-0.2481702003	-1.0944010131	3169/4088	0.775196
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-0.2529527144	-1.0959465858	3151/4064	0.775344
-0.2536688262	-1.0963136222	397/512	0.775391
-0.2538809947	-1.0959188521	3173/4092	0.775415
-0.2553108469	-1.0990589456	3077/3968	0.775454
-0.2506002305	-1.0907527672	3127/4032	0.775546
-0.2627483139	-1.125661374	3177/4096	0.775635
-0.2737025811	-1.1243826412	453/584	0.775685
-0.2572078266	-1.0701483981	3153/4064	0.775837
-0.2578515628	-1.0690157991	1589/2048	0.775879
-0.2572554694	-1.0688460466	3175/4092	0.775904
-0.2583272585	-1.064404573	3079/3968	0.775958
-0.2528051469	-1.0708468376	3177/4094	0.776014
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-0.1779839165	-0.9981354117	3155/4064	0.776329
-0.1887403018	-1.0031336165	795/1024	0.776367
-0.1900969035	-1.0016716424	1059/1364	0.776393
-0.1938053569	-1.0040258023	3081/3968	0.776462
-0.2517805706	-1.0284470396	3179/4094	0.776502
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-0.2790173379	-0.7646346909	1591/2048	0.776855
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-0.2690584307	-0.7253124622	2785/3584	0.777065
-0.2723898989	-0.7114951543	3183/4096	0.7771
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-0.2856206377	-0.7188214519	199/256	0.777344
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-0.2803414886	-0.7253096355	3179/4088	0.777642
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-0.2613047622	-0.6349728698	3185/4092	0.778348
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-0.249714241	-0.6130934099999999	449/576	0.779514
-0.2565698567	-0.6100543542	3193/4096	0.779541
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-0.2581516793	-0.6404198127	3107/3968	0.783014
-0.2581613082	-0.6404058491	3201/4088	0.783023
-0.2579980547	-0.6448620722	213/272	0.783088
-0.2567166198	-0.6404320386	401/512	0.783203
-0.2565612511	-0.6403076988	3183/4064	0.783219
-0.2570911417	-0.6405698755	3205/4092	0.783236
-0.2524894158	-0.6425589586	3203/4088	0.783513
-0.2530048666	-0.6427022556	3109/3968	0.783518
-0.2559628192	-0.640724055	3197/4080	0.783578
-0.2630617851	-0.6379293555	1605/2048	0.783691
-0.2632089162	-0.6380025213	3185/4064	0.783711
-0.2626602368	-0.6377887187	1069/1364	0.783724
-0.2611070124	-0.6377179576999999	3209/4094	0.78383
-0.2581482303	-0.6393133176	3211/4096	0.783936
-0.2566936905	-0.6353343455	3161/4032	0.783978
-0.2611017179	-0.6332163033	3205/4088	0.784002
-0.2605473274	-0.6335006937	3111/3968	0.784022
-0.2680998263	-0.6272245312	3199/4080	0.784069
-0.2712725055	-0.6285767981	803/1024	0.78418
-0.2712786845	-0.6285460841	3187/4064	0.784203
-0.271184062	-0.6290477155999999	3209/4092	0.784213
-0.2708116784	-0.6366890179	3211/4094	0.784319
-0.27878804	-0.6572994427	3213/4096	0.784424
-0.2763366164	-0.6699817876	3163/4032	0.784474
-0.2839916154	-0.6546022513999999	3207/4088	0.784491
-0.2808420445	-0.6518187707999999	3113/3968	0.784526
-0.2828190638	-0.6450999791000001	1067/1360	0.784559
-0.3080085197	-0.5817136968	1607/2048	0.784668
-0.3063665097	-0.5824886486	3189/4064	0.784695
-0.3054172007	-0.5832744348	3211/4092	0.784702
-0.2829312908	-0.55169978	3213/4094	0.784807
-0.2765269551	-0.5641854944	2813/3584	0.784877
-0.2712710217	-0.5440546849	3215/4096	0.784912
-0.2904108924	-0.5486522616	1055/1344	0.78497
-0.2902935543	-0.5493816453	3209/4088	0.78498
-0.2914509145	-0.5557925513	3115/3968	0.78503
-0.2901441401	-0.5537130673	3203/4080	0.785049
-0.2878504141	-0.549533877	201/256	0.785156
-0.2885208911	-0.5497406419999999	3191/4064	0.785187
-0.2887925074	-0.5499060255	1071/1364	0.785191
-0.2954056601	-0.5469933722	3215/4094	0.785296
-0.2849705448	-0.5545746032	3167/4032	0.785466
-0.2857541702	-0.5542955943	3211/4088	0.78547
-0.2870186874	-0.5504947529000001	3117/3968	0.785534
-0.2875606574	-0.551363643	641/816	0.785539
-0.2849371768	-0.5145051621	1609/2048	0.785645
-0.2833244795	-0.5186094768	3017/3840	0.785677
-0.2816145161	-0.5211994371000001	3215/4092	0.785679
-0.2844096726	-0.5356643341	3217/4094	0.785784
-0.2610266239	-0.5332248412	459/584	0.785959
-0.2580465904	-0.5379112358	3169/4032	0.785962
-0.2765269551	-0.5641854944	2817/3584	0.785993
-0.2831461433	-0.5781865919	1069/1360	0.786029
-0.2840121256	-0.5796680185999999	3119/3968	0.786038
-0.2827871921	-0.5799891813	805/1024	0.786133
-0.2817029878	-0.579919677	3217/4092	0.786168
-0.2822411471	-0.580052403	3195/4064	0.786171
-0.2843089727	-0.5793004992	3019/3840	0.786198
-0.2751957512	-0.5867793534	3219/4094	0.786273
-0.2874431472	-0.5740360453	3221/4096	0.786377
-0.2852138317	-0.5754022507	3215/4088	0.786448
-0.2810031759	-0.5744974077	3209/4080	0.78652
-0.2819268105	-0.5717918904	3121/3968	0.786542
-0.2765269551	-0.5641854944	2819/3584	0.786551
-0.2883306763	-0.5566984657	1611/2048	0.786621
-0.2875013786	-0.5552088564	1073/1364	0.786657
-0.2876760123	-0.555698785	3197/4064	0.786663
-0.297460186	-0.5883022603	3221/4094	0.786761
-0.2856526689	-0.616403983	3223/4096	0.786865
-0.2771275656	-0.6168710923	3217/4088	0.786937
-0.2780890899	-0.6166865878	3173/4032	0.786954
-0.2759920564	-0.6148910412	3211/4080	0.78701
-0.2787074844	-0.6154973914	3123/3968	0.787046
-0.2767963731	-0.6154870459	403/512	0.787109
-0.2767058926	-0.6159288059	3221/4092	0.787146
-0.2767943261	-0.6155568353999999	3199/4064	0.787156
-0.2775010113	-0.6172776026	3023/3840	0.78724
-0.2679737721	-0.6082424484	3225/4096	0.787354
-0.2486114684	-0.605845945	3219/4088	0.787427
-0.249714241	-0.6130934099999999	3175/4032	0.78745
-0.2252673451	-0.5768757744	3125/3968	0.78755
-0.2266836009	-0.5757459012	1613/2048	0.787598
-0.2252913962	-0.5780802953	293/372	0.787634
-0.226731166	-0.5783287959	3201/4064	0.787648
-0.2249755835	-0.585175499	3225/4094	0.787738
-0.2320039464	-0.5964375072	3227/4096	0.787842
-0.2200762997	-0.6370364013000001	3221/4088	0.787916
-0.2360556988	-0.6481764621	353/448	0.787946
-0.2323409575	-0.6690021527	643/816	0.78799
-0.2308827266	-0.6677435875	3127/3968	0.788054
-0.2312317145	-0.669560903	807/1024	0.788086
-0.2304611143	-0.6698802033	1075/1364	0.788123
-0.2324812986	-0.669337049	3203/4064	0.78814
-0.2228199883	-0.6760884068	3227/4094	0.788227
-0.2281028656	-0.6829765447	3229/4096	0.78833
-0.2283601973	-0.6826410245	3223/4088	0.788405
-0.2286842947	-0.6812578387	3179/4032	0.788442
-0.2300874812	-0.6834815319999999	3217/4080	0.78848
-0.2277916744	-0.6904127801	3129/3968	0.788558
-0.2264068305	-0.6908470175	1615/2048	0.788574
-0.2269481955	-0.6919919325	3227/4092	0.788612
-0.2255391021	-0.6857006164	3205/4064	0.788632
-0.2232931733	-0.6821908738	3229/4094	0.788715
-0.225684658	-0.6829411679	3225/4088	0.788894
-0.2242404485	-0.6844708917	3181/4032	0.788938
-0.2245440022	-0.6825878971	1073/1360	0.788971
-0.2248635474	-0.6827580794	101/128	0.789062
-0.2250193746	-0.6828343999000001	3229/4092	0.789101
-0.2244130085	-0.682510034	3207/4064	0.789124
-0.226055718	-0.6832423657	3231/4094	0.789204
-0.2225280776	-0.6823691200999999	3031/3840	0.789323
-0.2229204835	-0.682528242	461/584	0.789384
-0.2243568551	-0.6828786635	1061/1344	0.789435
-0.2220430947	-0.6861569386	3221/4080	0.789461
-0.229251985	-0.6830526714	1617/2048	0.789551
-0.2293772269	-0.6832288082	3133/3968	0.789567
-0.2290261008	-0.6828929254	1077/1364	0.789589
-0.2303969559	-0.6834826872999999	3209/4064	0.789616
-0.2281177733	-0.6823533976	3233/4094	0.789692
-0.2258557182	-0.6824189564	3235/4096	0.789795
-0.2296919697	-0.6765379030000001	3229/4088	0.789873
-0.2196283401	-0.6795047612	2831/3584	0.7899
-0.2104885669	-0.681366174	455/576	0.789931
-0.2102003942	-0.6863244664	3223/4080	0.789951
-0.2089617885	-0.6857178469	809/1024	0.790039
-0.2078016091	-0.6850460061	3135/3968	0.790071
-0.2080769078	-0.6855272311	3233/4092	0.790078
-0.2112354002	-0.6866094795	3211/4064	0.790108
-0.1966928295	-0.6860733735	3235/4094	0.790181
-0.213875826	-0.6860341236	3231/4088	0.790362
-0.2104885669	-0.681366174	3187/4032	0.790427
-0.2196283401	-0.6795047612	2833/3584	0.790458
-0.2226745288	-0.6840188867	1619/2048	0.790527
-0.2227679239	-0.6835719495	3235/4092	0.790567
-0.2226727681	-0.6838723406	3137/3968	0.790575
-0.2205353329	-0.6878803387	3213/4064	0.7906
-0.2254709828	-0.7034343426	3237/4094	0.790669
-0.2370844923	-0.6821600901	3239/4096	0.790771
-0.2392764453	-0.6798609704	3233/4088	0.790851
-0.24035943	-0.6804836656	1063/1344	0.790923
-0.2404536411	-0.6804723987	3227/4080	0.790931
-0.2400484658	-0.6802151950000001	405/512	0.791016
-0.2399052189	-0.6800870994	1079/1364	0.791056
-0.2405122743	-0.6806502885	3139/3968	0.791079
-0.2404347855	-0.6804301714	3215/4064	0.791093
-0.2389607582	-0.6794992026	3239/4094	0.791158
-0.2429463683	-0.6806455424	3235/4088	0.791341
-0.2393683721	-0.6754323396	3229/4080	0.791422
-0.2366339602	-0.6791775922	1621/2048	0.791504
-0.236746037	-0.6793169053	3239/4092	0.791544
-0.2361698633	-0.6789207672999999	3141/3968	0.791583
-0.2361510715	-0.6788111682	3217/4064	0.791585
-0.2372367157	-0.6798243459	3241/4094	0.791646
-0.2360270502	-0.681975731	3237/4088	0.79183
-0.228441815	-0.6810663445	1077/1360	0.791912
-0.2286842947	-0.6812578387	3193/4032	0.791915
-0.2286746937	-0.6804659807	811/1024	0.791992
-0.2288429804	-0.6801001321	3241/4092	0.792033
-0.2283753689	-0.6811953264	3219/4064	0.792077
-0.2286603313	-0.6806693165	3143/3968	0.792087
-0.2327618785	-0.6769384338	141/178	0.792135
-0.2366122713	-0.6679359223	3245/4096	0.792236
-0.2355404067	-0.6675387048	3239/4088	0.792319
-0.2350840136	-0.6621594733	3233/4080	0.792402
-0.2360556988	-0.6481764621	355/448	0.792411
-0.254917148	-0.6456961163	1623/2048	0.79248
-0.2542029836	-0.6446362511	1081/1364	0.792522
-0.26599546	-0.6447531399	3221/4064	0.792569
-0.2686455535	-0.6438377489	3145/3968	0.792591
-0.2692753655	-0.6440431262	3245/4094	0.792623
-0.2678812444	-0.6387528097	2841/3584	0.79269
-0.2757358648	-0.641126568	3247/4096	0.792725
-0.2701497112	-0.6483643339	463/584	0.792808
-0.2694272153	-0.6460319763	647/816	0.792892
-0.2714975659	-0.6467630261	3197/4032	0.792907
-0.2698304612	-0.6467479369	203/256	0.792969
-0.2697374019	-0.6471230026	295/372	0.793011
-0.2697854669	-0.6465906124	3223/4064	0.793061
-0.2701359088	-0.649302262	3147/3968	0.793095
-0.2699821958	-0.6501718917	3247/4094	0.793112
-0.2681516287	-0.6428323983	3249/4096	0.793213
-0.2682018179	-0.6439992862	3243/4088	0.793297
-0.2655235751	-0.6468227951	1079/1360	0.793382
-0.2763366164	-0.6699817876	457/576	0.793403
-0.2761367594	-0.6848382961	3047/3840	0.79349
-0.2754891989	-0.684675466	3247/4092	0.7935
-0.2687937192	-0.6853122046	3225/4064	0.793553
-0.2820423697	-0.6961224122	3149/3968	0.793599
-0.2812104863	-0.6961777065	3249/4094	0.7936
-0.2853354242	-0.7137806492	3251/4096	0.793701
-0.2663329158	-0.7101572091	3245/4088	0.793787
-0.2690584307	-0.7253124622	2845/3584	0.793806
-0.2582458905	-0.7363623179	3239/4080	0.793873
-0.2559805879	-0.734342169	1067/1344	0.793899
-0.2565065709	-0.7347782318	813/1024	0.793945
-0.256057258	-0.7343345958	1083/1364	0.793988
-0.2580133185	-0.7358394069	3049/3840	0.79401
-0.2588913616	-0.7332189635	3227/4064	0.794045
-0.2487283779	-0.7296296466	3251/4094	0.794089
-0.251846157	-0.7338049397999999	3151/3968	0.794103
-0.262386334	-0.7372553919	3247/4088	0.794276
-0.2658691984	-0.7302004831	3241/4080	0.794363
-0.2690584307	-0.7253124622	2847/3584	0.794364
-0.2819949946	-0.72855363	3203/4032	0.794395
-0.2837126781	-0.7300439144999999	1627/2048	0.794434
-0.2832613969	-0.7284829789	3251/4092	0.794477
-0.2686395458	-0.7615479451	3229/4064	0.794537
-0.2582980442	-0.7678793507	3253/4094	0.794577
-0.2645788084	-0.7700818009	3153/3968	0.794607
-0.1534385532	-0.8341876928	3249/4088	0.794765
-0.152173992	-0.8162849344000001	1081/1360	0.794853
-0.1416110762	-0.8307470999	3205/4032	0.794891
-0.1444123221	-0.8274765903	407/512	0.794922
-0.1452589171	-0.8278614224	3253/4092	0.794966
-0.1490216582	-0.8343546766	3231/4064	0.79503
-0.1502024006	-0.8356066441	3053/3840	0.795052
-0.1499487487	-0.8367660944	3255/4094	0.795066
-0.1482767534	-0.8281878853	3155/3968	0.795111
-0.1322665832	-0.7888401831	3251/4088	0.795254
-0.0983844693	-0.8157451650999999	649/816	0.795343
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-0.0959026694	-0.8157166752	1629/2048	0.79541
-0.09617575959999999	-0.8157434181	35/44	0.795455
-0.0971776211	-0.8174491101	3233/4064	0.795522
-0.0972524682	-0.8176338896999999	3257/4094	0.795554
-0.0986504044	-0.8162557418	3157/3968	0.795615
-0.0969132746	-0.8289665683	3253/4088	0.795744
-0.038067986	-0.8298040372	3209/4032	0.795883
-0.0453775513	-0.8273994777	815/1024	0.795898
-0.0420645478	-0.8264980231	3257/4092	0.795943
-0.0733260426	-0.807627682	3235/4064	0.796014
-0.0746901686	-0.8078903592	3259/4094	0.796043
-0.0873787384	-0.7672265409	3159/3968	0.796119
-0.0867305166	-0.7669985909	465/584	0.796233
-0.1199471111	-0.7765204308	1083/1360	0.796324
-0.1139095519	-0.7936393577999999	3211/4032	0.796379
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-0.1161193679	-0.7898265767	3259/4092	0.796432
-0.0919556141	-0.7973942807	3237/4064	0.796506
-0.09162979240000001	-0.7973926707	3261/4094	0.796532
-0.08775669010000001	-0.8085164664	2855/3584	0.796596
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-0.0853904939	-0.7915630666	3251/4080	0.796814
-0.0887330737	-0.7895388674	51/64	0.796875
-0.0881846754	-0.7894294415000001	1087/1364	0.796921
-0.0870013927	-0.7832470885	3239/4064	0.796998
-0.0868129336	-0.7828100918999999	3263/4094	0.79702
-0.0913707508	-0.8000662609	3163/3968	0.797127
-0.0918624284	-0.7988834571	3061/3840	0.797135
-0.0916072615	-0.7985813689	3259/4088	0.797211
-0.0918215958	-0.7681737866	3253/4080	0.797304
-0.092028262	-0.7629293697	1633/2048	0.797363
-0.09141349610000001	-0.7633517136	3215/4032	0.797371
-0.0915684345	-0.7640217152	3263/4092	0.79741
-0.0858870893	-0.7658824762999999	3241/4064	0.79749
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-0.0744912677	-0.8017568848	3261/4088	0.797701
-0.08775669010000001	-0.8085164664	2859/3584	0.797712
-0.09798508879999999	-0.8219927336	217/272	0.797794
-0.0946840402	-0.8215762006	817/1024	0.797852
-0.09479507550000001	-0.8210426165	3217/4032	0.797867
-0.0948232234	-0.8218676434	3265/4092	0.797898
-0.09329792319999999	-0.8283396646	3243/4064	0.797982
-0.0925599609	-0.8297053377	3267/4094	0.797997
-0.0986504044	-0.8162557418	3167/3968	0.798135
-0.0976896558	-0.8172458107	3263/4088	0.79819
-0.08775669010000001	-0.8085164664	2861/3584	0.79827
-0.09297119349999999	-0.8023248462	3257/4080	0.798284
-0.0986044594	-0.798721589	1635/2048	0.79834
-0.0991682856	-0.7981203499	1073/1344	0.798363
-0.0974378669	-0.7992346256	99/124	0.798387
-0.1337515435	-0.794211856	3269/4094	0.798486
-0.1323548022	-0.7112318734999999	3169/3968	0.798639
-0.1314649742	-0.7120494005	3265/4088	0.798679
-0.1389795521	-0.7124542503	3259/4080	0.798775
-0.1355644826	-0.7104001799	3221/4032	0.798859
-0.1364879475	-0.7108947551	3269/4092	0.798876
-0.1298435288	-0.7106647537	3247/4064	0.798967
-0.1305539211	-0.7112386918	3271/4094	0.798974
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--0.3915869291	-0.8554059808	1131/1360	0.831618
--0.3915874898	-0.8553914887	3403/4092	0.831623
--0.3915751867	-0.8551627344	3405/4094	0.831705
--0.3914322646	-0.8551982201	2981/3584	0.831752
--0.3915022693	-0.8554286437	3301/3968	0.831905
--0.3915643993	-0.85539152	3381/4064	0.831939
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--0.3915652128	-0.8553551753	3355/4032	0.832093
--0.3915944318	-0.8553745912	679/816	0.832108
--0.3915967785	-0.8553874666	1135/1364	0.832111
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--0.3910727647	-0.8557888698	1705/2048	0.83252
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--0.390552263	-0.8560921183	3397/4080	0.832598
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--0.3913993237	-0.85513963	853/1024	0.833008
--0.3914098916	-0.8551455869	3199/3840	0.833073
--0.3914128501	-0.8551469208	3359/4032	0.833085
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--0.3914887245	-0.8551491226	1707/2048	0.833496
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--0.3915789972	-0.8551660092	3413/4094	0.833659
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--0.3911607192	-0.8534096392	1709/2048	0.834473
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--0.3826791039	-0.8576983896	3001/3584	0.837333
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--0.4562607198	-1.0114255439	863/1024	0.842773
--0.4559821356	-1.0054851871	3449/4092	0.842864
--0.4669390833	-1.019070385	3439/4080	0.842892
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--0.4653455337	-1.0325794837	27/32	0.84375
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--0.4658430573	-1.0280243032	3455/4094	0.843918
--0.4721083258	-1.0386243369	3403/4032	0.843998
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--0.4460647703	-1.0299880292	3431/4064	0.844242
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--0.4806020972	-1.0273048693	3027/3584	0.844587
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--0.4942679619	-1.0160668487	865/1024	0.844727
--0.4946815452	-1.0167131207	3433/4064	0.844734
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--0.4573813835	-1.1010198895	487/576	0.845486
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--0.4143018836	-1.101769647	3463/4092	0.846285
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--0.4158374006	-1.043765145	867/1024	0.84668
--0.4154032973	-1.045382448	3441/4064	0.846703
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--0.3992961175	-1.0515864908	3467/4094	0.846849
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--3.8471039587	-0.0065128258	3673/3840	0.95651
--3.8506278366	-0.0113727946	1959/2048	0.956543
--3.8525799735	-0.0055782888	551/576	0.956597
--3.855893046	-0.0080545285	1301/1360	0.956618
--3.8569620548	-0.0133568573	3911/4088	0.956703
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--3.8793967664	-0.0018073614	1963/2048	0.958496
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--3.8984252555	-0.0026384729	1965/2048	0.959473
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--3.9912118734	-0.0029335943	1973/2048	0.963379
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--4.0291604443	-0.0360048047	1975/2048	0.964355
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--4.0800023812	-0.0748118368	1977/2048	0.965332
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--4.0881223609	-0.1329792001	3927/4064	0.966289
--4.090399752	-0.1384046859	1979/2048	0.966309
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--4.1069995637	-0.2296045468	3931/4064	0.967274
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--4.1788836566	-0.3058524244	991/1024	0.967773
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--4.2976590071	-0.2546499744	1983/2048	0.968262
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--4.259796493	-0.1777525694	3845/3968	0.969002
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--4.2257209731	-0.2300397712	1985/2048	0.969238
--4.2210031997	-0.2317897773	3939/4064	0.969242
--4.2209490427	-0.2468625832	791/816	0.969363
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--4.1533827524	-0.2159342048	993/1024	0.969727
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--4.1244265512	-0.1948828356	1987/2048	0.970215
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--4.1129966537	-0.1681867266	559/576	0.970486
--4.1221556157	-0.1608605669	3851/3968	0.970514
--4.1317364999	-0.1598469269	3727/3840	0.970573
--4.1238827205	-0.1384104925	497/512	0.970703
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--4.1203966304	-0.1571447513	567/584	0.97089
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--4.1114733229	-0.1504780341	3975/4094	0.970933
--4.0999650542	-0.1555262002	435/448	0.970982
--4.0990544265	-0.1471012843	3853/3968	0.971018
--4.1031715486	-0.1281710639	1989/2048	0.971191
--4.1061966704	-0.1303839233	3947/4064	0.971211
--4.0978079571	-0.1314369366	3481/3584	0.971261
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--4.0981285949	-0.1243049477	3971/4088	0.97138
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--4.1005431784	-0.1218190755	3977/4094	0.971422
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--4.0973979196	-0.1150911221	3855/3968	0.971522
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--4.1227264617	-0.1007792464	3949/4064	0.971703
--4.1016053754	-0.1016183988	793/816	0.971814
--4.0968035733	-0.1018980608	3483/3584	0.971819
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--4.098400126	-0.08883212	3977/4092	0.971896
--4.1024005237	-0.087303138	173/178	0.97191
--4.0965246997	-0.0818315906	3919/4032	0.971974
--4.0965685358	-0.0761814754	3857/3968	0.972026
--4.121200281	-0.0677078686	3733/3840	0.972135
--4.1381790009	-0.065988746	1991/2048	0.972168
--4.1268621287	-0.0678383479	3951/4064	0.972195
--4.1519193974	-0.0529804792	3967/4080	0.972304
--4.1584261141	-0.0570178785	3975/4088	0.972358
--4.1633488333	-0.0595273291	3485/3584	0.972377
--4.16248237	-0.0629653956	3979/4092	0.972385
--4.1596280369	-0.06786378699999999	3981/4094	0.972399
--4.1733281267	-0.0694801005	1307/1344	0.97247
--4.1768070136	-0.0820090991	3859/3968	0.97253
--4.1885394703	-0.0412612181	249/256	0.972656
--4.2034227417	-0.0343954705	3953/4064	0.972687
--4.1851146052	-0.0668499109	1323/1360	0.972794
--4.1741650342	-0.0645028302	3977/4088	0.972847
--4.1684417896	-0.058530501	1327/1364	0.972874
--4.1699509225	-0.0534199569	3983/4094	0.972887
--4.1633488333	-0.0595273291	3487/3584	0.972935
--4.1589872093	-0.0545940518	3923/4032	0.972966
--4.1534546509	-0.0483319866	3861/3968	0.973034
--4.1664757604	-0.0139046163	1993/2048	0.973145
--4.1609323835	-0.0204500058	3737/3840	0.973177
--4.1600004819	-0.0219952904	3955/4064	0.973179
--4.166396045	0	3971/4080	0.973284
--4.1711695109	0	3979/4088	0.973337
--4.1755722049	-0.0018169294	3983/4092	0.973363
--4.1755455077	-0.0047299185	3985/4094	0.973376
--4.1819010273	0	3925/4032	0.973462
--4.1865051248	0	3489/3584	0.973493
--4.1900114229	-0.0063967164	3863/3968	0.973538
--4.1976467576	-0.0080459303	997/1024	0.973633
--4.1932189514	-0.0123829641	3957/4064	0.973671
--4.1926489337	-0.0085122437	3739/3840	0.973698
--4.1938328503	0	3973/4080	0.973775
--4.1972207779	0	3981/4088	0.973826
--4.1993751307	-0.0009005338	3985/4092	0.973851
--4.1996007623	-0.0020656951	3987/4094	0.973864
--4.2046045554	0	3865/3968	0.974042
--4.2056490871	0	3491/3584	0.974051
--4.2093845411	-0.0046486552	1995/2048	0.974121
--4.206693925	-0.002789882	3959/4064	0.974163
--4.2156767049	0	569/584	0.974315
--4.2189920855	-0.0041932186	1329/1364	0.97434
--4.2167148212	-0.0059677518	3989/4094	0.974353
--4.2227495883	-0.012037979	3929/4032	0.974454
--4.2183835221	-0.0206973208	3867/3968	0.974546
--4.2341754249	-0.0172479131	499/512	0.974609
--4.2295378342	-0.0276052222	3961/4064	0.974656
--4.2253646477	-0.0142597669	3743/3840	0.97474
--4.2233211554	-0.012877371	3977/4080	0.974755
--4.2234544989	-0.0086512524	3985/4088	0.974804
--4.2281529564	-0.0045755808	3989/4092	0.974829
--4.2304489777	-0.0065044411	3991/4094	0.974841
--4.2347221564	0	3931/4032	0.97495
--4.2420592868	-0.0031142653	3869/3968	0.97505
--4.2458947055	-0.0047967075	1997/2048	0.975098
--4.2423649807	-0.0025337327	3963/4064	0.975148
--4.2437112231	0	3495/3584	0.975167
--4.2484867743	0	3979/4080	0.975245
--4.2504314274	0	3987/4088	0.975294
--4.2525078509	-0.0017244702	3991/4092	0.975318
--4.2520832229	-0.0032895755	3993/4094	0.97533
--4.2649472911	0	437/448	0.975446
--4.2554967422	-0.018771178	3871/3968	0.975554
--4.2656035138	-0.0261276226	999/1024	0.975586
--4.261363059	-0.0188344234	3965/4064	0.97564
--4.2791655322	-0.0135902685	3497/3584	0.975725
--4.2791089976	-0.0186856198	1327/1360	0.975735
--4.2798582704	-0.0236520925	3989/4088	0.975783
--4.2783033356	-0.0269939979	121/124	0.975806
--4.276631291	-0.0277417017	3995/4094	0.975818
--4.2802724318	-0.0330310652	3935/4032	0.975942
--4.2734061262	-0.0390758376	3873/3968	0.976058
--4.2755601001	-0.0462143529	1999/2048	0.976074
--4.2806438116	-0.0432975179	3967/4064	0.976132
--4.2854128163	-0.0510739266	3983/4080	0.976225
--4.2870393186	-0.0553672197	3991/4088	0.976272
--4.2891909766	-0.0580175131	3499/3584	0.976283
--4.2843246485	-0.0613996921	3995/4092	0.976295
--4.2817124138	-0.0612256425	3749/3840	0.976302
--4.2792893015	-0.0616008378	3997/4094	0.976307
--4.3846950011	-0.0916567581	3937/4032	0.976438
--4.3106851986	-0.0396119063	125/128	0.976562
--4.327875994	-0.0466337231	3969/4064	0.976624
--4.3108439817	-0.0678801049	797/816	0.976716
--4.2979499037	-0.0655381377	3993/4088	0.976761
--4.2954515138	-0.0569767011	3997/4092	0.976784
--4.2971106455	-0.0535088611	3999/4094	0.976795
--4.2949731424	-0.054445497	3751/3840	0.976823
--4.2891909766	-0.0580175131	3501/3584	0.976842
--4.2878006223	-0.0473653447	1313/1344	0.976935
--4.2878399574	-0.0336159853	2001/2048	0.977051
--4.2902030588	-0.0354874709	3877/3968	0.977067
--4.2843805785	-0.0367211409	3971/4064	0.977116
--4.2814394802	-0.0313664469	1329/1360	0.977206
--4.2810328024	-0.0290893778	3995/4088	0.97725
--4.2826780401	-0.0267192738	43/44	0.977273
--4.2844159779	-0.0267969093	4001/4094	0.977284
--4.2791655322	-0.0135902685	3503/3584	0.9774
--4.2858999314	-0.0114700543	563/576	0.977431
--4.3016465763	-0.0102295114	1001/1024	0.977539
--4.3002963074	-0.0148734313	3879/3968	0.977571
--4.2954785035	-0.0136699751	3973/4064	0.977608
--4.2960689105	0	3989/4080	0.977696
--4.2997497462	0	571/584	0.97774
--4.3019422486	-0.0015746998	4001/4092	0.977761
--4.3022932194	-0.0026907356	4003/4094	0.977772
--4.3065465201	0	3943/4032	0.977927
--4.3086714311	0	3505/3584	0.977958
--4.3121505646	-0.0040256821	2003/2048	0.978027
--4.309891264	-0.0022243051	3881/3968	0.978075
--4.3115578898	0	3975/4064	0.9781
--4.3154564673	0	3991/4080	0.978186
--4.3176708175	0	3999/4088	0.978229
--4.3189601108	-0.0033062041	4003/4092	0.97825
--4.3178688037	-0.0043575679	45/46	0.978261
--4.3217785505	-0.0087403454	3757/3840	0.978385
--4.3229814952	-0.010760055	1315/1344	0.978423
--4.3294348788	-0.008850234699999999	501/512	0.978516
--4.3258278015	-0.0116362553	3883/3968	0.978579
--4.3241643689	-0.011492982	3977/4064	0.978593
--4.3228381804	-0.006938878	1331/1360	0.978676
--4.3225021054	-0.0045028318	4001/4088	0.978718
--4.3254752902	-0.0028886867	1335/1364	0.978739
--4.3265207793	-0.0035902196	4007/4094	0.978749
--4.3302861177	0	3947/4032	0.978919
--4.3334682288	-0.0019501426	2005/2048	0.979004
--4.3325001735	0	3509/3584	0.979074
--4.3330678456	0	3885/3968	0.979083
--4.3331287609	0	3979/4064	0.979085
--4.335275837	0	4003/4088	0.979207
--4.3358118437	-0.0007096075	4007/4092	0.979228
--4.3357169833	-0.0011651483	4009/4094	0.979238
--4.340016887	-0.0034061858	3949/4032	0.979415
--4.3394489543	-0.0038910175	3761/3840	0.979427
--4.343082265	-0.0056545946	1003/1024	0.979492
--4.3402323832	-0.0031498987	3981/4064	0.979577
--4.3404559644	-0.002816163	3887/3968	0.979587
--4.3418534264	0	3511/3584	0.979632
--4.3436302404	0	3997/4080	0.979657
--4.3452729013	0	4005/4088	0.979697
--4.3463728818	-0.0012562403	4009/4092	0.979717
--4.3464198518	-0.0020452257	4011/4094	0.979726
--4.3551568043	0	439/448	0.979911
--4.3528775577	-0.0062873646	3763/3840	0.979948
--4.3539492043	-0.0108153817	2007/2048	0.97998
--4.3603587219	-0.0104154583	3983/4064	0.980069
--4.3594246973	-0.0125813334	3889/3968	0.980091
--4.3600058708	-0.0149420286	1333/1360	0.980147
--4.3596216526	-0.0171649044	4007/4088	0.980186
--4.3596335997	-0.0179641025	3513/3584	0.98019
--4.3572244352	-0.0182362092	1337/1364	0.980205
--4.3558962656	-0.0177979745	4013/4094	0.980215
--4.3846950011	-0.0916567581	3953/4032	0.980407
--4.3731944834	-0.0258140651	251/256	0.980469
--4.3606528655	-0.0341135427	3985/4064	0.980561
--4.3619305793	-0.0270199558	3891/3968	0.980595
--4.3588324528	-0.0239608594	4001/4080	0.980637
--4.3593533575	-0.0207885589	4009/4088	0.980675
--4.3618620842	-0.0192322592	4013/4092	0.980694
--4.3633200412	-0.0191937101	4015/4094	0.980703
--4.3596335997	-0.0179641025	3515/3584	0.980748
--4.36444806	-0.0058172863	565/576	0.980903
--4.3732940186	-0.0064471157	2009/2048	0.980957
--4.3698685812	-0.0074852069	3767/3840	0.98099
--4.3720381766	0	3987/4064	0.981053
--4.3746185978	0	3893/3968	0.981099
--4.3759011126	0	4003/4080	0.981127
--4.3778089515	0	573/584	0.981164
--4.3789353176	-0.0019102785	365/372	0.981183
--4.3788227136	-0.0029732361	4017/4094	0.981192
--4.3858877415	0	3517/3584	0.981306
--4.3881636234	-0.008469583100000001	1319/1344	0.981399
--4.3936691049	-0.0081446429	1005/1024	0.981445
--4.3894358182	-0.0067437632	3769/3840	0.98151
--4.3884494585	-0.0038828576	3989/4064	0.981545
--4.3928106721	0	3895/3968	0.981603
--4.3957745176	0	4013/4088	0.981654
--4.3968302515	-0.0016376541	1339/1364	0.981672
--4.3969791485	-0.0024920888	4019/4094	0.981681
--4.4042178716	0	3519/3584	0.981864
--4.4051110779	-0.0038191747	3959/4032	0.981895
--4.4081880361	-0.006944573	2011/2048	0.981934
--4.4119550984	0	3991/4064	0.982037
--4.4178000379	0	3897/3968	0.982107
--4.4180811113	0	4007/4080	0.982108
--4.4279352826	0	55/56	0.982143
--4.4222351721	-0.0117076687	4019/4092	0.98216
--4.4189208412	-0.0125994602	4021/4094	0.982169
--4.3846950011	-0.0916567581	3961/4032	0.982391
--4.4236923179	-0.0471744978	503/512	0.982422
--4.4200308875	-0.0328470801	3993/4064	0.98253
--4.4226683179	-0.0329298607	3773/3840	0.982552
--4.4264411361	-0.0266178045	4009/4080	0.982598
--4.4275119973	-0.0267612894	3899/3968	0.982611
--4.4368000962	-0.0205984777	4017/4088	0.982632
--4.4397011433	-0.0322151379	4021/4092	0.982649
--4.4386218776	-0.0357564062	4023/4094	0.982658
--4.4455492498	-0.0540655446	1321/1344	0.982887
--4.4463827855	-0.0582617355	2013/2048	0.98291
--4.4529307054	-0.0554350238	3523/3584	0.98298
--4.4517427383	-0.0603809851	3995/4064	0.983022
--4.4521456663	-0.0631343914	1337/1360	0.983088
--4.4525837967	-0.0645810304	3901/3968	0.983115
--4.451619533	-0.0652429955	4019/4088	0.983121
--4.4498757774	-0.06573561209999999	1341/1364	0.983138
--4.4486839137	-0.0655642671	175/178	0.983146
--4.3846950011	-0.0916567581	3965/4032	0.983383
--4.4365118721	-0.08775538250000001	1007/1024	0.983398
--4.4472917709	-0.0850265142	3997/4064	0.983514
--4.4525102546	-0.0837869421	3525/3584	0.983538
--4.4512075939	-0.0906102759	4013/4080	0.983578
--4.4510310785	-0.0942097226	4021/4088	0.983611
--4.4503116105	-0.0959685166	3903/3968	0.983619
--4.449002708	-0.0957504089	4025/4092	0.983627
--4.4473326263	-0.096291894	4027/4094	0.983635
--4.3846950011	-0.0916567581	3967/4032	0.983879
--4.4379603635	-0.1288148952	2015/2048	0.983887
--4.456130017	-0.1404859986	3999/4064	0.984006
--4.4668659326	-0.1484570519	803/816	0.984069
--4.4812554152	-0.151407474	3527/3584	0.984096
--4.4727793925	-0.1575365114	4023/4088	0.9841
--4.471371171	-0.168066932	4027/4092	0.984115
--4.4750322811	-0.169364647	3779/3840	0.984115
--4.4649480273	-0.177446289	4029/4094	0.984123
--4.4681008096	-0.1794594274	3905/3968	0.984123
--4.5084906419	-0.1024923568	63/64	0.984375
--4.516856355	-0.137738241	4001/4064	0.984498
--4.5054449335	-0.1469319985	1339/1360	0.984559
--4.4953746876	-0.1452337329	575/584	0.984589
--4.4920484858	-0.1393057355	1343/1364	0.984604
--4.491371982	-0.1344976876	4031/4094	0.984612
--4.4874187296	-0.1360747037	3907/3968	0.984627
--4.4875674463	-0.140155065	3781/3840	0.984635
--4.4812554152	-0.151407474	3529/3584	0.984654
--4.4643693064	-0.1059236909	2017/2048	0.984863
--4.4683411576	-0.1057086147	3971/4032	0.984871
--4.4562493085	-0.1040191198	4003/4064	0.98499
--4.4544588032	-0.1003851503	4019/4080	0.985049
--4.4547473956	-0.09749064	4027/4088	0.985078
--4.4567806379	-0.09635432100000001	4031/4092	0.985093
--4.4584261551	-0.0962271133	4033/4094	0.9851
--4.4555181811	-0.0955352231	3909/3968	0.985131
--4.4525102546	-0.0837869421	3531/3584	0.985212
--4.4651814302	-0.0710624205	1009/1024	0.985352
--4.4701325836	-0.07315517940000001	3973/4032	0.985367
--4.4564218039	-0.07495735539999999	4005/4064	0.985482
--4.4533410002	-0.0702850129	4021/4080	0.985539
--4.4536309691	-0.0673872133	4029/4088	0.985568
--4.4553120095	-0.0664219773	4033/4092	0.985582
--4.4564784505	-0.0660978529	4035/4094	0.985589
--4.4525837967	-0.0645810304	3911/3968	0.985635
--4.4529307054	-0.0554350238	3533/3584	0.98577
--4.4620386205	-0.0502444791	2019/2048	0.98584
--4.4603465316	-0.0541712883	1325/1344	0.985863
--4.4546489054	-0.0438871825	4007/4064	0.985974
--4.4543324908	-0.0371043854	1341/1360	0.986029
--4.4596175104	-0.0262996873	4031/4088	0.986057
--4.4667302166	-0.0334069175	1345/1364	0.98607
--4.4680615485	-0.0367172611	4037/4094	0.986077
--4.4800660135	-0.027530542	3913/3968	0.986139
--4.48491409	-0.0339575141	3787/3840	0.986198
--4.5021793949	-0.0258691038	505/512	0.986328
--4.5028276931	-0.0360426672	3977/4032	0.986359
--4.4870112058	-0.0300375826	4009/4064	0.986467
--4.4809839238	-0.0253061912	805/816	0.98652
--4.4780160242	-0.0113077252	4033/4088	0.986546
--4.4866735837	-0.0128338088	367/372	0.986559
--4.4897525311	-0.0135877404	4039/4094	0.986566
--4.490854697	0	3915/3968	0.986643
--4.5081899406	-0.0052849622	2021/2048	0.986816
--4.5046071113	-0.0041425567	3979/4032	0.986855
--4.5056158526	0	3537/3584	0.986886
--4.5102418279	0	4011/4064	0.986959
--4.5121565843	0	4027/4080	0.98701
--4.5141124347	-0.0010498955	4035/4088	0.987035
--4.5139736586	-0.0022269363	4039/4092	0.987048
--4.5138185576	-0.0030519788	4041/4094	0.987054
--4.5186430316	0	3917/3968	0.987147
--4.5225820978	-0.0075193121	3791/3840	0.98724
--4.5290061914	-0.0105484821	1011/1024	0.987305
--4.5238613914	-0.0091921229	1327/1344	0.987351
--4.5264384993	0	3539/3584	0.987444
--4.5281934421	0	4013/4064	0.987451
--4.5344690052	-0.0015017626	4037/4088	0.987524
--4.5345702953	-0.0028321806	1347/1364	0.987537
--4.534679157	-0.0038324119	4043/4094	0.987543
--4.5397211697	0	3919/3968	0.987651
--4.5456571975	-0.0087247213	3793/3840	0.98776
--4.5474415196	-0.0143430681	2023/2048	0.987793
--4.5517877177	-0.0066512782	569/576	0.987847
--4.5561717468	-0.0167367162	4015/4064	0.987943
--4.5565487121	-0.0193486169	4031/4080	0.98799
--4.5569888943	-0.0207971881	3541/3584	0.988002
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diff --git a/sandbox/wittner/airplane-crab b/sandbox/wittner/airplane-crab
deleted file mode 100644
index 10a7ae7..0000000
--- a/sandbox/wittner/airplane-crab
+++ /dev/null
@@ -1,1835 +0,0 @@
-#
-# gnuplot data -- mindenom=8 maxdenom=16384 mindist=1/100 type=airplane
--7.159191247	0
--5.0322201519	0.0141514461
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diff --git a/sandbox/wittner/buff b/sandbox/wittner/buff
deleted file mode 100644
index b8f931f..0000000
--- a/sandbox/wittner/buff
+++ /dev/null
@@ -1,3660 +0,0 @@
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-1.001736582	0.887304041	5153/12288	0.41935221
-1.001989209	0.8868741455	6817/16256	0.41935285
-1.002063195	0.8867824583	6869/16380	0.41935287
-1.012624577	0.8831139509	13/31	0.41935484
-1.035958243	0.8803294286	421/992	0.42439516
-1.038438012	0.8783983103	6899/16256	0.42439715
-1.038566377	0.8780558295	5215/12288	0.42439779
-1.038672043	0.8777819196	13905/32764	0.42439873
-1.03972411	0.8771552362	3475/8188	0.42440156
-1.042597487	0.8764129299	6953/16383	0.42440334
-1.043585225	0.8762202897	1735/4088	0.42441292
-1.04480061	0.8758704472	2173/5120	0.42441406
-1.046416032	0.8753434786	6845/16128	0.42441716
-1.046621296	0.8751172482	13853/32640	0.42441789
-1.048569284	0.8735705231	6737/15872	0.42445817
-1.048669038	0.8733369015	1725/4064	0.42445866
-1.048719584	0.8731458858	13907/32764	0.42445977
-1.049072089	0.8727894814	6951/16376	0.42446263
-1.049494151	0.8720531028	6941/16352	0.42447407
-1.049477515	0.8717647709	163/384	0.42447917
-1.049448265	0.8717258233	6953/16380	0.42448107
-1.049439042	0.8715770143	1987/4681	0.42448195
-1.049452519	0.8714799308	579/1364	0.4244868
-1.049634801	0.8710819765	13801/32512	0.42448942
-1.049653989	0.8709902137	13475/31744	0.42448967
-1.049870109	0.8707259864	3477/8191	0.42449029
-1.050233979	0.8702847897	433/1020	0.4245098
-1.050288086	0.8701989874	13693/32256	0.42451017
-1.050630608	0.8699833354	13907/32760	0.4245116
-1.050766026	0.8699421927	4347/10240	0.42451172
-1.051660717	0.869498462	13897/32736	0.42451735
-1.05221738	0.8690919668	10433/24576	0.42451986
-1.052227071	0.8690266148	6901/16256	0.42452018
-1.052280488	0.8689334667	13909/32764	0.42452082
-1.052554391	0.8686919604	3369/7936	0.42452117
-1.054256026	0.868096107	869/2047	0.42452369
-1.056934559	0.8672412303	10435/24576	0.42460124
-1.056972339	0.8671556945	13859/32640	0.42460172
-1.057387726	0.8669378936	107/252	0.42460317
-1.058574901	0.8668598641	13913/32767	0.42460402
-1.059377792	0.8668401437	3475/8184	0.42460899
-1.059867208	0.8669747414	1087/2560	0.42460938
-1.064597958	0.8669533455	231/544	0.42463235
-1.065190078	0.866953682	4637/10920	0.4246337
-1.06570761	0.8670027782	13697/32256	0.42463418
-1.066607822	0.8666445336	13901/32736	0.42463954
-1.066926886	0.8663206918	2609/6144	0.42464193
-1.06695098	0.8662112554	13913/32764	0.4246429
-1.067036684	0.8661089561	6903/16256	0.42464321
-1.067425193	0.8658102026	3477/8188	0.42464582
-1.068477636	0.865385558	1685/3968	0.42464718
-1.069691249	0.865276586	2319/5461	0.4246475
-1.076426528	0.8657860755	31/73	0.42465753
-1.085788805	0.8672121958	6745/15872	0.4249622
-1.086630322	0.8668671487	6949/16352	0.42496331
-1.087614387	0.8662598508	2611/6144	0.42496745
-1.087768464	0.8660208713	13871/32640	0.42496936
-1.087834957	0.8659763531	6961/16380	0.42496947
-1.088539478	0.8657075899	13925/32767	0.42497024
-1.089196953	0.8655959666	3427/8064	0.4249752
-1.089562331	0.865626761	1739/4092	0.42497556
-1.09298727	0.8660872916	3481/8191	0.42497864
-1.096996974	0.8672004251	17/40	0.425
-1.100204044	0.8681614391	13913/32736	0.42500611
-1.100357886	0.8681797751	13709/32256	0.4250062
-1.101034758	0.8679276051	10445/24576	0.42500814
-1.101385739	0.8677007167	13925/32764	0.42500916
-1.108213414	0.8696850086	993/2336	0.42508562
-1.110249124	0.8694985278	6747/15872	0.42508821
-1.110710102	0.8690925773	10447/24576	0.42508952
-1.111336764	0.8687938678	2321/5460	0.42509158
-1.111560566	0.8687765014	925/2176	0.42509191
-1.112302673	0.8687260192	13929/32767	0.42509232
-1.113482334	0.8687520104	4353/10240	0.42509766
-1.113656071	0.8687800532	3479/8184	0.42509775
-1.114394717	0.8686961405	857/2016	0.42509921
-1.116587797	0.8679078524	13495/31744	0.42511971
-1.11702377	0.8674177918	13927/32760	0.4251221
-1.117121127	0.8673062503	3469/8160	0.42512255
-1.117330571	0.8668720246	4639/10912	0.4251283
-1.117305287	0.8667908233	653/1536	0.42513021
-1.117282612	0.8667469095	13929/32764	0.42513124
-1.117356551	0.8664758686	3481/8188	0.42513434
-1.117427396	0.8663130869	6911/16256	0.42513533
-1.117704362	0.866004643	6965/16383	0.42513581
-1.118822859	0.8652801244	869/2044	0.42514677
-1.120013365	0.8644005185	1687/3968	0.42515121
-1.122935191	0.8639213491	1741/4095	0.42515263
-1.126176431	0.8642441227	449/1056	0.42518939
-1.12878432	0.8634120721	13715/32256	0.42519221
-1.12917472	0.8633895727	13931/32764	0.42519228
-1.133588082	0.864225127	2177/5120	0.42519531
-1.134624755	0.8645803411	6963/16376	0.42519541
-1.14992193	0.8695728264	55/129	0.42635659
-1.153726777	0.8717325523	6931/16256	0.42636565
-1.162272781	0.8711406041	2183/5120	0.42636719
-1.165587781	0.8713524095	249/584	0.42636986
-1.166527303	0.8708098391	13753/32256	0.42637029
-1.173944254	0.8679021965	423/992	0.42641129
-1.174007048	0.867406342	13971/32764	0.42641314
-1.174677898	0.8666900623	6983/16376	0.42641671
-1.175036204	0.8658916942	1733/4064	0.42642717
-1.174992544	0.8656074336	6973/16352	0.42643102
-1.174954526	0.8655810658	655/1536	0.42643229
-1.174898161	0.8654933827	1397/3276	0.42643468
-1.174885256	0.8653605863	13973/32767	0.42643513
-1.174924887	0.8651997713	13919/32640	0.42643995
-1.175068791	0.8648874373	1745/4092	0.42644184
-1.175048335	0.864721312	13537/31744	0.42644279
-1.175589778	0.8642081292	3493/8191	0.42644366
-1.176464768	0.8635654644	3439/8064	0.42646329
-1.176990144	0.8633026148	4367/10240	0.42646484
-1.177198859	0.8632367454	4657/10920	0.4264652
-1.178178327	0.8627964478	29/68	0.42647059
-1.178507457	0.8624864544	13961/32736	0.42647239
-1.178506911	0.8624044444	10481/24576	0.42647298
-1.178580484	0.862180392	13973/32764	0.42647418
-1.178579295	0.8621256066	6769/15872	0.42647429
-1.181988017	0.8615190731	873/2047	0.42647777
-1.183845905	0.8616521879	3467/8128	0.4265502
-1.185868543	0.8610153434	6975/16352	0.42655333
-1.185938472	0.8608189911	10483/24576	0.42655436
-1.186150724	0.8605228028	13759/32256	0.4265563
-1.186423005	0.860392506	2329/5460	0.42655678
-1.187022126	0.8602161617	13977/32767	0.42655721
-1.18807933	0.8600690716	273/640	0.4265625
-1.188853292	0.859929739	3491/8184	0.42656403
-1.191430295	0.8592987368	1993/4672	0.4265839
-1.192231351	0.8584853794	215/504	0.4265873
-1.192570036	0.8579016961	3481/8160	0.42659314
-1.19254933	0.8578080293	4655/10912	0.42659457
-1.192536165	0.8578007483	2621/6144	0.42659505
-1.192499705	0.857729347	13977/32764	0.42659626
-1.192683451	0.8572331658	3493/8188	0.4265999
-1.192660565	0.8571489646	6771/15872	0.4266003
-1.193186338	0.85668541	6989/16383	0.42660074
-1.195811509	0.8554141176	6935/16256	0.42661171
-1.201109868	0.8529694699	13987/32764	0.42690148
-1.20308246	0.8514989104	6991/16376	0.42690523
-1.203512762	0.8504561422	847/1984	0.42691532
-1.203408289	0.8501625234	1735/4064	0.42691929
-1.203375681	0.8501426616	6981/16352	0.42692025
-1.203370121	0.8501443211	2623/6144	0.42692057
-1.203299412	0.8500605761	111/260	0.42692308
-1.203284455	0.8499453617	13989/32767	0.42692343
-1.20330336	0.8497806697	13771/32256	0.42692832
-1.203390827	0.8495213549	929/2176	0.42693015
-1.203389025	0.8494584399	1747/4092	0.4269306
-1.203661504	0.8489579467	3497/8191	0.426932
-1.203898906	0.8487131117	13881/32512	0.42695005
-1.204026337	0.848465332	13963/32704	0.42695083
-1.204153781	0.8481449698	1093/2560	0.42695312
-1.204218012	0.848031027	13987/32760	0.4269536
-1.204415985	0.8475525223	3443/8064	0.42695933
-1.204391084	0.8474605711	871/2040	0.42696078
-1.204379893	0.8474535893	4659/10912	0.42696114
-1.204377972	0.847454172	10493/24576	0.42696126
-1.204333032	0.8473811873	13989/32764	0.42696252
-1.204749492	0.8455957739	3389/7936	0.42704133
-1.204712706	0.8455766131	3471/8128	0.42704232
-1.204707756	0.8455776289	6983/16352	0.42704256
-1.204707369	0.845578284	10495/24576	0.42704264
-1.204644777	0.8455093225	1399/3276	0.42704518
-1.204625982	0.8454344394	1999/4681	0.4270455
-1.204598867	0.8453078988	4373/10240	0.42705078
-1.204569919	0.8452246434	13775/32256	0.42705233
-1.204558946	0.8452177958	13939/32640	0.4270527
-1.204557192	0.8452181308	1165/2728	0.42705279
-1.204421077	0.8449981766	13557/31744	0.42707283
-1.204415612	0.8449996354	13885/32512	0.42707308
-1.204415207	0.8450001928	13967/32704	0.42707314
-1.204366804	0.8449780156	13991/32760	0.4270757
-1.20432047	0.8449755523	41/96	0.42708333
-1.20431724	0.8449793226	13993/32764	0.42708461
-1.204284473	0.8449797756	3497/8188	0.42708842
-1.204248588	0.8449620182	6997/16383	0.42708906
-1.204106612	0.8448200968	873/2044	0.42710372
-1.204105042	0.8448210936	6943/16256	0.42710384
-1.204089864	0.8448193214	6779/15872	0.42710433
-1.204002428	0.8445473005	583/1365	0.42710623
-1.203964656	0.8441339531	4661/10912	0.42714443
-1.20395995	0.8441330461	6971/16320	0.42714461
-1.203939325	0.8441050806	6889/16128	0.42714534
-1.203927424	0.8440694087	13995/32764	0.42714565
-1.203949084	0.8438685162	2187/5120	0.42714844
-1.203956125	0.8437498825	6995/16376	0.42714949
-1.20394507	0.8430887213	5249/12288	0.42716471
-1.203943463	0.8430899292	6985/16352	0.42716487
-1.203930311	0.8430874634	217/508	0.42716535
-1.203865749	0.8430054762	6997/16380	0.42716728
-1.203859006	0.8430034931	1695/3968	0.42716734
-1.203837888	0.8428610815	13997/32767	0.42716758
-1.204712258	0.8411088269	437/1023	0.42717498
-1.20492168	0.8404395476	13975/32704	0.42731776
-1.205760283	0.8399178463	13893/32512	0.42731914
-1.206199802	0.8394608856	13999/32760	0.4273199
-1.206576985	0.8388758664	13565/31744	0.42732485
-1.206523173	0.8386457119	5251/12288	0.42732747
-1.206518048	0.8386453174	4663/10912	0.42732771
-1.206497284	0.8386179747	3487/8160	0.42732843
-1.206480698	0.8385772264	14001/32764	0.42732878
-1.20652076	0.8383676501	1723/4032	0.42733135
-1.206622801	0.8381084164	3499/8188	0.42733268
-1.20696933	0.8377401987	7001/16383	0.42733321
-1.207718774	0.8371208003	547/1280	0.42734375
-1.208327109	0.8364467143	1747/4088	0.42734834
-1.20885473	0.8359811922	6947/16256	0.4273499
-1.210845736	0.8345475511	13567/31744	0.42738785
-1.210810934	0.8344362662	13991/32736	0.42738881
-1.210858762	0.8342864002	465/1088	0.42738971
-1.210856363	0.834258824	14003/32764	0.42738982
-1.211288667	0.8337305925	6893/16128	0.42739335
-1.211275291	0.8336721749	6999/16376	0.42739375
-1.211431391	0.8327927352	1313/3072	0.42740885
-1.211417972	0.8327919019	6989/16352	0.42740949
-1.211360357	0.8327205103	1737/4064	0.42741142
-1.211355378	0.8327188268	7001/16380	0.42741148
-1.21133532	0.8326058152	14005/32767	0.42741173
-1.21136697	0.8319543109	53/124	0.42741935
-1.211905757	0.8310756976	3501/8191	0.42742034
-1.213500699	0.829451984	1997/4672	0.42744007
-1.214454303	0.8290760712	4377/10240	0.42744141
-1.215157471	0.8287018956	14003/32760	0.427442
-1.215693884	0.8285896588	13897/32512	0.42744218
-1.220714315	0.8272388029	10505/24576	0.42744954
-1.220788519	0.8269306822	13993/32736	0.4274499
-1.221827839	0.8258749356	13569/31744	0.42745086
-1.221887849	0.8257812547	14005/32764	0.42745086
-1.226302677	0.8244084845	109/255	0.42745098
-1.233599913	0.8233382134	13587/31744	0.42801789
-1.23521233	0.8218503044	10519/24576	0.42801921
-1.236543363	0.8210327093	6999/16352	0.42802104
-1.239140874	0.8207306859	779/1820	0.42802198
-1.241454748	0.8214056887	14025/32767	0.4280221
-1.243193387	0.8220087762	3479/8128	0.42802657
-1.245353867	0.8220073861	4383/10240	0.42802734
-1.248677263	0.8212783168	113/264	0.4280303
-1.25394071	0.8197967994	3397/7936	0.4280494
-1.254275014	0.8192088966	13999/32704	0.42805161
-1.254494818	0.8188322993	14023/32760	0.4280525
-1.254765513	0.8183067249	13917/32512	0.42805733
-1.254693486	0.8181024958	1315/3072	0.4280599
-1.254663826	0.8180796356	4671/10912	0.42806085
-1.254631494	0.8180317646	14025/32764	0.42806129
-1.254658104	0.8178060246	3493/8160	0.42806373
-1.254754647	0.8173610276	3505/8188	0.42806546
-1.25522576	0.81691578	7013/16383	0.42806568
-1.256164384	0.8162536186	863/2016	0.4280754
-1.258135044	0.8150019252	13589/31744	0.4280809
-1.258880248	0.8145507658	125/292	0.42808219
-1.263023016	0.8145019634	1753/4095	0.42808303
-1.267267309	0.8152262383	13919/32512	0.42811885
-1.269816933	0.8145941843	14015/32736	0.42812195
-1.2702876	0.8144074484	14027/32764	0.42812233
-1.272491467	0.8148139972	137/320	0.428125
-1.274483362	0.8147693025	7011/16376	0.42812653
-1.279606463	0.8149761023	6905/16128	0.4281374
-1.280387616	0.8142084138	5261/12288	0.42814128
-1.280622951	0.813722762	7001/16352	0.42814335
-1.280793246	0.8134735204	13591/31744	0.4281439
-1.280973349	0.813286844	7013/16380	0.42814408
-1.281897023	0.8130372374	14029/32767	0.42814417
-1.286109642	0.8130294941	435/1016	0.42814961
-1.315712279	0.8187440566	2001/4672	0.42829623
-1.316609101	0.8181730135	1559/3640	0.4282967
-1.318407158	0.8171931032	3399/7936	0.42830141
-1.318518068	0.8165768354	13925/32512	0.4283034
-1.318467317	0.8165227813	5263/12288	0.42830404
-1.31841965	0.8163357603	14021/32736	0.42830523
-1.318410359	0.8162180985	14033/32764	0.42830546
-1.319345261	0.8153191924	233/544	0.42830882
-1.319896554	0.814773099	3507/8188	0.42830972
-1.321121164	0.8145722875	2339/5461	0.42830983
-1.324052531	0.8137760223	2193/5120	0.42832031
-1.325826093	0.8129642032	1727/4032	0.42832341
-1.327470409	0.8115418413	1751/4088	0.42832681
-1.332086848	0.8081830423	6799/15872	0.42836442
-1.332025289	0.8081248749	13927/32512	0.42836491
-1.331937231	0.8079199278	14023/32736	0.42836632
-1.331925658	0.8078213704	14035/32764	0.4283665
-1.332169982	0.8070217503	6991/16320	0.4283701
-1.332157595	0.8067669067	305/712	0.42837079
-1.331951674	0.8059455081	329/768	0.42838542
-1.331868285	0.8059307223	7005/16352	0.42838796
-1.33182701	0.8059115867	2339/5460	0.42838828
-1.331788137	0.8058333318	14037/32767	0.42838832
-1.331599048	0.8052984041	1741/4064	0.42839567
-1.331571842	0.8052904473	13599/31744	0.42839592
-1.331504366	0.8049136309	1753/4092	0.42839687
-1.331822158	0.804219459	3509/8191	0.42839702
-1.332674688	0.8026738902	13819/32256	0.42841642
-1.333090844	0.8020508209	4387/10240	0.42841797
-1.33326771	0.8017501192	14011/32704	0.42841854
-1.333465984	0.8014411317	401/936	0.4284188
-1.334400049	0.7998565794	10529/24576	0.42842611
-1.334371846	0.7998509298	13929/32512	0.42842643
-1.334265898	0.7996221979	425/992	0.42842742
-1.334230303	0.799476276	14037/32764	0.42842754
-1.336402372	0.7965704494	437/1020	0.42843137
-1.343753546	0.7944217608	877/2047	0.42843185
-1.363807621	0.7916754136	10531/24576	0.42850749
-1.364455926	0.7906597982	6911/16128	0.42850942
-1.36559297	0.7896517962	1001/2336	0.42851027
-1.366489414	0.7892280625	7019/16380	0.42851038
-1.368447894	0.7895816107	14041/32767	0.42851039
-1.374369664	0.7900755319	1097/2560	0.42851563
-1.381939227	0.7890084034	3483/8128	0.4285187
-1.3860962	0.7892607101	1169/2728	0.42851906
-1.410361503	0.7921150583	13823/32256	0.42854043
-1.411193611	0.79127723	14015/32704	0.42854085
-1.411843399	0.7908853337	14039/32760	0.4285409
-1.414361426	0.7877000318	2633/6144	0.42854818
-1.414107596	0.7873851202	13933/32512	0.42854946
-1.41401069	0.7872207633	14029/32736	0.42854961
-1.413984362	0.7870512196	14041/32764	0.42854963
-1.415492828	0.7838288648	3401/7936	0.42855343
-1.416293764	0.7820468646	3497/8160	0.42855392
-1.417586054	0.7807479193	3509/8188	0.42855398
-1.422237164	0.7802526456	7021/16383	0.42855399
-1.547423795	1.12087349	3/7	0.42857143
-1.199243161	1.264646645	29/65	0.44615385
-1.157321677	1.27564118	257/576	0.44618056
-1.067299877	1.295122313	2057/4608	0.44639757
-1.038433429	1.346611561	14627/32764	0.44643511
-1.07108569	1.368274377	7311/16376	0.44644602
-1.06989989	1.364518522	3643/8160	0.44644608
-1.069955128	1.358917437	3543/7936	0.44644657
-1.077010213	1.352757784	14615/32736	0.44645039
-1.074756588	1.349600345	2743/6144	0.44645182
-1.081749449	1.350624151	7313/16380	0.4464591
-1.095311589	1.356857735	3657/8191	0.44646563
-1.088906146	1.371693262	609/1364	0.44648094
-1.093043565	1.370043979	3629/8128	0.4464813
-1.102334154	1.368941513	1143/2560	0.44648437
-1.108711238	1.376809139	1043/2336	0.44648973
-1.110889393	1.374134797	7201/16128	0.44649058
-1.123023336	1.380646765	7315/16383	0.44649942
-1.126279855	1.422614743	7313/16376	0.44656815
-1.126660094	1.416476797	911/2040	0.44656863
-1.129668659	1.408242423	443/992	0.44657258
-1.132571313	1.404745107	209/468	0.4465812
-1.13279401	1.402626453	4573/10240	0.44658203
-1.143753816	1.402014408	3655/8184	0.44660313
-1.14242254	1.400268779	1815/4064	0.44660433
-1.143060237	1.396366113	4877/10920	0.44661172
-1.14249593	1.396497432	7303/16352	0.44661204
-1.141442917	1.396304846	343/768	0.44661458
-1.141340153	1.393295133	2439/5461	0.4466215
-1.143644401	1.393639912	159/356	0.44662921
-1.14337352	1.392610609	7289/16320	0.4466299
-1.143964298	1.388461713	7089/15872	0.44663558
-1.151915449	1.39192067	1829/4095	0.44664225
-1.153873845	1.399816449	913/2044	0.44667319
-1.157123901	1.397240627	1801/4032	0.44667659
-1.160404311	1.397343982	2287/5120	0.44667969
-1.166086474	1.403376963	7315/16376	0.44669028
-1.167050167	1.401200757	243/544	0.44669118
-1.170234483	1.398483369	5489/12288	0.44669596
-1.170043561	1.395836655	3545/7936	0.44669859
-1.173317896	1.395731404	2091/4681	0.44669942
-1.175009438	1.398497879	813/1820	0.4467033
-1.176229058	1.396787093	2087/4672	0.44670377
-1.182433202	1.409794501	3659/8191	0.4467098
-1.169105291	1.421058491	457/1023	0.44672532
-1.161181341	1.428331947	2059/4608	0.4468316
-1.149723626	1.44016545	1219/2728	0.44684751
-1.156769628	1.440733343	227/508	0.44685039
-1.162868818	1.443958353	14639/32760	0.44685592
-1.163032809	1.442529749	7307/16352	0.44685665
-1.163568225	1.441134263	5491/12288	0.44685872
-1.16546133	1.440189376	7207/16128	0.4468626
-1.168597709	1.442323444	7321/16383	0.44686565
-1.168345182	1.445738566	3659/8188	0.44687347
-1.170561186	1.445652502	143/320	0.446875
-1.1760395	1.44656147	14529/32512	0.44688115
-1.176607957	1.450195242	14643/32767	0.44688253
-1.174308633	1.462475251	261/584	0.44691781
-1.176092287	1.461909185	14187/31744	0.4469191
-1.179183498	1.460187376	901/2016	0.4469246
-1.183418722	1.461803893	7319/16376	0.44693454
-1.183248157	1.460233737	3647/8160	0.44693627
-1.183653166	1.459233278	4877/10912	0.44693915
-1.183384328	1.459105694	1373/3072	0.4469401
-1.18276507	1.458204474	14531/32512	0.44694267
-1.183691379	1.457533152	14645/32767	0.44694357
-1.184913054	1.457675397	7321/16380	0.4469475
-1.185098318	1.45662684	14617/32704	0.44694839
-1.185588878	1.455346642	3547/7936	0.4469506
-1.18990786	1.458426941	3661/8191	0.44695397
-1.19056422	1.46351524	59/132	0.4469697
-1.193866102	1.463883353	4577/10240	0.44697266
-1.19559636	1.463533261	3633/8128	0.44697343
-1.196206543	1.468982353	1627/3640	0.44697802
-1.198153431	1.467800177	7309/16352	0.44697896
-1.199639022	1.467514011	10985/24576	0.44698079
-1.20236066	1.478652356	2441/5461	0.44698773
-1.19035326	1.481249775	915/2047	0.4469956
-1.182409454	1.483096112	515/1152	0.44704861
-1.168803953	1.482388902	7321/16376	0.44705667
-1.163845147	1.516305087	7331/16383	0.44747604
-1.159684981	1.517086803	1031/2304	0.44748264
-1.156512509	1.555286846	7329/16376	0.44754519
-1.164070823	1.546695559	913/2040	0.44754902
-1.163845874	1.541279245	2095/4681	0.44755394
-1.166929461	1.541661028	7331/16380	0.447558
-1.166914832	1.540748996	4583/10240	0.44755859
-1.168890283	1.539868214	2091/4672	0.44755993
-1.177439137	1.536990437	111/248	0.44758065
-1.176242159	1.533878718	1819/4064	0.44758858
-1.17533286	1.533782069	7319/16352	0.44759051
-1.175299188	1.534050414	1375/3072	0.44759115
-1.174438658	1.53340755	14665/32764	0.44759492
-1.17476094	1.531493206	7333/16383	0.44759812
-1.176637008	1.530682022	3665/8188	0.44760625
-1.176294742	1.530632743	7219/16128	0.44760665
-1.17759189	1.528802859	487/1088	0.44761029
-1.182043854	1.529707485	47/105	0.44761905
-1.18536466	1.534087088	419/936	0.44764957
-1.185629875	1.533534636	7277/16256	0.4476501
-1.186347603	1.532352423	915/2044	0.44765166
-1.187341488	1.531009042	573/1280	0.44765625
-1.191132349	1.530823386	7331/16376	0.44766732
-1.19098954	1.530041576	1805/4032	0.44766865
-1.191231444	1.529106198	3653/8160	0.44767157
-1.191005597	1.528959299	4885/10912	0.44767229
-1.190964312	1.529023387	5501/12288	0.44767253
-1.191160356	1.527480828	14669/32767	0.44767602
-1.192498116	1.5274168	7333/16380	0.4476801
-1.193801696	1.526187113	14641/32704	0.44768224
-1.196379156	1.529001055	3667/8191	0.44768649
-1.196253252	1.531041288	2063/4608	0.44769965
-1.196511975	1.534521932	4871/10880	0.44770221
-1.209532689	1.540406477	3665/8184	0.44782502
-1.20911583	1.53599763	1777/3968	0.44783266
-1.208289719	1.536038189	455/1016	0.44783465
-1.208203742	1.536243133	7323/16352	0.44783513
-1.208262713	1.536268037	5503/12288	0.44783529
-1.207553462	1.535736979	14673/32764	0.44783909
-1.207759287	1.53431995	7337/16383	0.44784228
-1.208658903	1.533507998	3667/8188	0.44785051
-1.208483633	1.533128368	2293/5120	0.44785156
-1.20852211	1.532160823	7223/16128	0.44785466
-1.208308945	1.532034983	7309/16320	0.44785539
-1.208257903	1.532080597	4887/10912	0.44785557
-1.212537187	1.528260639	4891/10920	0.44789377
-1.211328549	1.528019225	7109/15872	0.44789567
-1.211277064	1.528231402	7281/16256	0.44789616
-1.211322061	1.528268274	1831/4088	0.44789628
-1.209509641	1.526895353	7335/16376	0.44791158
-1.209135359	1.527398823	43/96	0.44791667
-1.208496532	1.527528853	7337/16380	0.4479243
-1.207961536	1.527727989	14649/32704	0.44792686
-1.207663702	1.526489272	3669/8191	0.44793066
-1.208049055	1.5251992	611/1364	0.44794721
-1.207633638	1.524828417	4587/10240	0.44794922
-1.207585365	1.523425693	2935/6552	0.44795482
-1.20680166	1.523423638	7325/16352	0.44795744
-1.206825149	1.523536168	3641/8128	0.44795768
-1.206484022	1.523801546	3555/7936	0.44795867
-1.207184436	1.520328603	7339/16383	0.44796435
-1.211033587	1.521167213	917/2047	0.44797264
-1.215767097	1.523424632	319/712	0.44803371
-1.216075433	1.521340232	4889/10912	0.44803886
-1.215945716	1.521345547	457/1020	0.44803922
-1.215782903	1.520898551	3613/8064	0.44804067
-1.21700829	1.519846094	7339/16380	0.4480464
-1.21704434	1.519500211	1147/2560	0.44804688
-1.221970881	1.518122471	3667/8184	0.4480694
-1.221688664	1.517842425	975/2176	0.44806985
-1.222292165	1.515158712	233/520	0.44807692
-1.221360728	1.515134147	2753/6144	0.44807943
-1.221410228	1.5152411	7327/16352	0.44807975
-1.221033357	1.51542164	1821/4064	0.44808071
-1.219788929	1.514424022	889/1984	0.44808468
-1.220861675	1.512381519	2447/5461	0.44808643
-1.223095334	1.511498996	3669/8188	0.44809477
-1.223505282	1.506940732	7313/16320	0.44810049
-1.233123638	1.514179793	367/819	0.44810745
-1.232075708	1.519131164	2065/4608	0.44813368
-1.233391274	1.52852197	229/511	0.4481409
-1.237829406	1.532507781	2439/5440	0.44834559
-1.232609657	1.537187086	1033/2304	0.44835069
-1.23012532	1.54702413	1833/4088	0.44838552
-1.232022871	1.547896195	7289/16256	0.44838829
-1.23736923	1.548368072	7117/15872	0.4483997
-1.237045892	1.54836252	7343/16376	0.4484001
-1.237144661	1.546654993	2755/6144	0.44840495
-1.237024852	1.54669853	4893/10912	0.44840543
-1.236883294	1.546256873	3659/8160	0.44840686
-1.237406463	1.545429856	2099/4681	0.44840846
-1.238289885	1.545320613	113/252	0.4484127
-1.239394393	1.543598678	2095/4672	0.4484161
-1.24143115	1.54622486	3673/8191	0.448419
-1.242979231	1.548489731	1835/4092	0.44843597
-1.24396653	1.548633371	287/640	0.4484375
-1.246095584	1.549867071	4897/10920	0.44844322
-1.246723419	1.548365925	7333/16352	0.44844667
-1.249024067	1.547909053	3645/8128	0.4484498
-1.250390639	1.551632818	2449/5461	0.44845266
-1.249088813	1.566342898	7345/16376	0.44852223
-1.252798113	1.565110235	7119/15872	0.44852571
-1.25254354	1.56320661	61/136	0.44852941
-1.254770175	1.563481846	2449/5460	0.4485348
-1.255105534	1.563314797	4593/10240	0.44853516
-1.256015408	1.56286914	3617/8064	0.44853671
-1.261408667	1.561959484	14641/32640	0.44856005
-1.261089235	1.560419322	689/1536	0.44856771
-1.260798319	1.56068319	7335/16352	0.44856898
-1.259897614	1.559606381	1823/4064	0.44857283
-1.260792547	1.558284809	7349/16383	0.44857474
-1.262098282	1.557414413	3673/8188	0.44858329
-1.262352873	1.554890224	445/992	0.44858871
-1.261946843	1.552023811	7321/16320	0.44859069
-1.269838887	1.557208979	1837/4095	0.44859585
-1.272980538	1.558411738	4881/10880	0.44862132
-1.271255936	1.565136088	1633/3640	0.44862637
-1.274974673	1.56299254	131/292	0.44863014
-1.277810793	1.564887457	2297/5120	0.44863281
-1.280294514	1.563937221	7293/16256	0.44863435
-1.283623734	1.571692751	7347/16376	0.44864436
-1.28851647	1.569823985	5513/12288	0.44864909
-1.28871371	1.56637348	7121/15872	0.44865171
-1.293715634	1.566989272	14701/32767	0.44865261
-1.297661219	1.57008966	7349/16380	0.4486569
-1.292357714	1.592197546	3675/8191	0.44866317
-1.25264013	1.59431949	517/1152	0.44878472
-1.240452226	1.587196391	3673/8184	0.44880254
-1.233502948	1.59268844	377/840	0.44880952
-1.235292944	1.594730107	5515/12288	0.44881185
-1.236102358	1.598300934	14477/32256	0.44881572
-1.226155432	1.606612223	57/127	0.4488189
-1.220158726	1.605358626	7309/16256	0.4496186
-1.21304558	1.611507685	7363/16376	0.4496214
-1.213207745	1.616402698	5525/12288	0.44962565
-1.212110601	1.620513559	14733/32767	0.4496292
-1.210921642	1.620781192	1223/2720	0.44963235
-1.208831171	1.621087827	491/1092	0.4496337
-1.201525912	1.621390029	14705/32704	0.44963919
-1.200470464	1.617487892	3683/8191	0.44963985
-1.199421783	1.613126163	259/576	0.44965278
-1.178882277	1.604575442	14709/32704	0.4497615
-1.162273105	1.610398877	1227/2728	0.44978006
-1.167233001	1.61838851	14681/32640	0.44978554
-1.167553519	1.617181478	7139/15872	0.44978579
-1.167883622	1.616652117	421/936	0.44978632
-1.170998956	1.615710348	7355/16352	0.44979207
-1.171684252	1.615442344	14737/32764	0.44979246
-1.172784489	1.618619559	7369/16383	0.44979552
-1.171230691	1.621578558	457/1016	0.44980315
-1.172786946	1.621998508	3683/8188	0.44980459
-1.173027538	1.621928319	2303/5120	0.44980469
-1.176062847	1.623870176	475/1056	0.44981061
-1.175388798	1.637277084	14683/32640	0.44984681
-1.175497046	1.636477233	14737/32760	0.44984737
-1.177700021	1.633982194	14739/32764	0.4498535
-1.180942565	1.633622434	7313/16256	0.44986467
-1.18085283	1.633251969	7367/16376	0.44986566
-1.180569816	1.632334641	691/1536	0.44986979
-1.180259007	1.632063117	4909/10912	0.4498717
-1.181258863	1.631090183	3671/8160	0.44987745
-1.181324247	1.630824142	7369/16380	0.4498779
-1.183954658	1.631417338	3685/8191	0.44988402
-1.186064985	1.633610595	4607/10240	0.44990234
-1.187749217	1.635005619	979/2176	0.44990809
-1.188032375	1.634927518	4913/10920	0.44990842
-1.188661758	1.634229029	11057/24576	0.44991048
-1.190445758	1.633915089	1051/2336	0.44991438
-1.19080059	1.634010516	14741/32764	0.44991454
-1.158386052	1.672871091	2457/5461	0.4499176
-1.187986664	1.640319693	3657/8128	0.44992618
-1.18070724	1.646772122	7369/16376	0.44998779
-1.182402736	1.647561082	11059/24576	0.44999186
-1.18317024	1.647352654	14731/32736	0.44999389
-1.183790178	1.64830193	14745/32767	0.44999542
-1.184044348	1.649467157	9/20	0.45
-1.183795731	1.652887422	14739/32752	0.45001832
-1.183468701	1.653248532	14631/32512	0.45001845
-1.184777288	1.655412691	3683/8184	0.45002444
-1.185049725	1.655414233	3629/8064	0.4500248
-1.186715726	1.656057684	14743/32760	0.45003053
-1.186715194	1.655954455	14689/32640	0.45003064
-1.186855055	1.655429833	2765/6144	0.45003255
-1.187762466	1.654566484	14745/32764	0.45003663
-1.18776591	1.65449389	7359/16352	0.45003669
-1.18964619	1.65583223	7373/16383	0.45003968
-1.190544985	1.658653453	3685/8188	0.45004885
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-1.10931726	1.701961638	14793/32764	0.45150165
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-1.079374248	1.705904915	14791/32752	0.45160601
-1.060320031	1.680622453	5/11	0.45454545
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-0.9631835506	1.674870289	133/292	0.45547945
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-0.9654877692	1.674724638	7459/16376	0.45548363
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-0.9643726403	1.678525141	2099/4608	0.45551215
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-0.9562066562	1.686704726	14929/32767	0.45561083
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-0.9555646468	1.689784414	14813/32512	0.45561639
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-0.9613288358	1.696223678	113/248	0.45564516
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-0.9338357304	1.811022909	4691/10240	0.45810547
-0.9343412453	1.812260974	7447/16256	0.45810778
-0.9353957303	1.812284508	7491/16352	0.4581091
-0.9364472382	1.813597057	15011/32767	0.45811335
-0.935586388	1.814000894	2111/4608	0.45811632
-0.9343508707	1.815383636	14953/32640	0.45811887
-0.9436555287	1.825100428	7477/16320	0.45814951
-0.941758648	1.825124848	7499/16368	0.45815005
-0.9414614522	1.825707917	5003/10920	0.45815018
-0.9423444465	1.821259269	15011/32764	0.45815529
-0.9442980527	1.816041418	931/2032	0.45816929
-0.943736085	1.816523785	1873/4088	0.45817025
-0.943863426	1.816769874	7503/16376	0.45817049
-0.943942166	1.816710991	2815/6144	0.45817057
-0.9425734799	1.815779	15013/32767	0.45817438
-0.9429676075	1.814830895	14779/32256	0.45817832
-0.9427283998	1.813803457	997/2176	0.45818015
-0.9423222084	1.813606975	14999/32736	0.4581806
-0.9422030889	1.813753779	1501/3276	0.45818071
-0.9448844732	1.812717559	3753/8191	0.45818581
-0.9459352604	1.812782131	14545/31744	0.45819682
-0.9477433918	1.812802681	14897/32512	0.45820005
-0.9475129522	1.812160207	14985/32704	0.45820083
-0.9472013838	1.811510594	1173/2560	0.45820312
-0.9480226793	1.809931131	3695/8064	0.45820933
-0.9477131942	1.809432719	3739/8160	0.45821078
-0.9475075485	1.809572051	15011/32760	0.45821123
-0.9475341963	1.809565518	11261/24576	0.45821126
-0.9472328071	1.807293932	15013/32764	0.45821634
-0.9492972644	1.808010942	7507/16383	0.45821889
-0.9511529035	1.809241231	7273/15872	0.45822833
-0.9520814654	1.810264922	7449/16256	0.45823081
-0.9571819669	1.80886737	15015/32764	0.45827738
-0.9592451043	1.80564296	3637/7936	0.45829133
-0.95889062	1.806193183	3725/8128	0.45829232
-0.9590121533	1.806385415	3747/8176	0.45829256
-0.9590913637	1.806358093	7505/16376	0.45829262
-0.9569696199	1.804776761	14959/32640	0.4583027
-0.9569776729	1.804847669	5001/10912	0.45830279
-0.9570028735	1.804849519	7507/16380	0.45830281
-0.9565188726	1.800801901	14549/31744	0.45832283
-0.9566681633	1.800961996	14901/32512	0.45832308
-0.956740258	1.800938673	14989/32704	0.45832314
-0.9567381318	1.800910866	15011/32752	0.45832316
-0.954961467	1.801928367	11/24	0.45833333
-0.9545217049	1.803055369	15017/32764	0.45833842
-0.9534841091	1.802348996	2503/5461	0.45834096
-0.9515067872	1.801272069	7495/16352	0.45835372
-0.9516292391	1.801323911	7451/16256	0.45835384
-0.9516451176	1.801707175	7275/15872	0.45835433
-0.9504329534	1.7999769	15019/32767	0.45835749
-0.9529150953	1.798018872	1877/4095	0.45836386
-0.9525661352	1.79786688	15013/32752	0.45838422
-0.9527263951	1.797536	14991/32704	0.4583843
-0.9532945328	1.797312629	14903/32512	0.4583846
-0.9554839401	1.796027347	15017/32760	0.45839438
-0.9555122964	1.796056737	2501/5456	0.45839443
-0.9554460212	1.796151406	7481/16320	0.45839461
-0.9551533062	1.796050924	7393/16128	0.45839534
-0.9549631658	1.795129588	2347/5120	0.45839844
-0.9546653701	1.794860077	15019/32764	0.45839946
-0.9545872916	1.792021976	5633/12288	0.45841471
-0.9547201781	1.792033656	937/2044	0.45841487
-0.954650114	1.792386558	1863/4064	0.45841535
-0.9536358525	1.792640387	1819/3968	0.45841734
-0.953122094	1.791160319	15021/32767	0.45841853
-0.9528556714	1.787918889	2503/5460	0.45842491
-0.9529027832	1.788209759	15007/32736	0.45842498
-0.9522047955	1.788740585	14963/32640	0.45842525
-0.9574872732	1.788413621	3755/8191	0.45842998
-0.9593943195	1.791013678	15015/32752	0.45844529
-0.9597217451	1.790467773	14905/32512	0.45844611
-0.9611829443	1.791268863	14553/31744	0.45844884
-0.9636351575	1.794269302	15019/32760	0.45845543
-0.964305292	1.793579577	469/1023	0.45845552
-0.9649388782	1.792670892	11269/24576	0.45853678
-0.9649433264	1.792343543	7509/16376	0.45853688
-0.9657294535	1.792402934	3749/8176	0.45853718
-0.9669447302	1.795665131	15025/32767	0.4585406
-0.9667991657	1.796081193	3639/7936	0.45854335
-0.9679664654	1.796903452	1073/2340	0.45854701
-0.967982587	1.796789003	15011/32736	0.45854717
-0.9683049425	1.797761927	2113/4608	0.45855035
-0.9701940794	1.801994031	653/1424	0.45856742
-0.9702252282	1.801630805	14997/32704	0.45856776
-0.9710621467	1.801140805	14909/32512	0.45856914
-0.9727613332	1.799099422	14557/31744	0.45857485
-0.9718180118	1.798824551	5635/12288	0.45857747
-0.9718554046	1.798837182	15023/32760	0.45857753
-0.9718032503	1.798940088	1251/2728	0.45857771
-0.9714868983	1.798847867	1871/4080	0.45857843
-0.9714980101	1.797959937	1849/4032	0.45858135
-0.9712278906	1.797480222	15025/32764	0.45858259
-0.972518307	1.797044112	7513/16383	0.45858512
-0.9738435829	1.796618902	587/1280	0.45859375
-0.9742565133	1.795646226	3755/8188	0.45859795
-0.9739989447	1.795545027	7499/16352	0.45859834
-0.9742320198	1.794560198	7455/16256	0.4585999
-0.9756403733	1.794866874	15027/32767	0.45860164
-0.9765634201	1.796088086	7279/15872	0.45860635
-0.9784615221	1.796346381	15021/32752	0.45862848
-0.9788787006	1.796891142	14999/32704	0.45862891
-0.9796415823	1.797921038	14911/32512	0.45863066
-0.9822502252	1.797161154	14559/31744	0.45863785
-0.9818706302	1.797464837	3005/6552	0.45863858
-0.9812499929	1.797029695	499/1088	0.45863971
-0.981688462	1.795558394	7397/16128	0.45864335
-0.9815619644	1.795604228	15027/32764	0.45864363
-0.9817935818	1.792606911	1409/3072	0.45865885
-0.9819168425	1.792593366	7511/16376	0.45865901
-0.9819025076	1.792951958	1875/4088	0.45865949
-0.9809255078	1.793140291	233/508	0.45866142
-0.9804792377	1.792153267	2147/4681	0.45866268
-0.979407475	1.790407602	7513/16380	0.45866911
-0.9792508706	1.790764562	455/992	0.45866935
-0.9824889927	1.787952993	3757/8191	0.45867415
-0.9859264904	1.78769906	2143/4672	0.45869007
-0.9870279807	1.786863519	4697/10240	0.45869141
-0.9867997965	1.785848754	14913/32512	0.45869218
-0.9902432642	1.783497616	11273/24576	0.45869954
-0.9904271531	1.783716085	5009/10920	0.45869963
-0.9897810323	1.784157648	1877/4092	0.4586999
-0.9885671469	1.782932639	14561/31744	0.45870086
-0.9877094673	1.783023479	3743/8160	0.45870098
-0.9939469645	1.777557185	15029/32764	0.45870468
-0.99776149	1.784416916	2505/5461	0.4587072
-0.9948043939	1.796398392	939/2047	0.45872008
-0.9974401346	1.798413279	2147/4680	0.45876068
-0.9965983913	1.799875571	2503/5456	0.458761
-0.9942008235	1.800551642	7487/16320	0.45876225
-0.9928386049	1.799933417	14563/31744	0.45876386
-0.9919772391	1.80124669	15031/32764	0.45876572
-0.9897987901	1.804993116	11275/24576	0.45878092
-0.9896300111	1.804874348	7513/16376	0.45878114
-0.9900419472	1.804440336	3751/8176	0.4587818
-0.991520869	1.805300505	3729/8128	0.45878445
-0.9913092622	1.806018534	15033/32767	0.45878475
-0.9921449772	1.808181129	167/364	0.45879121
-0.990375909	1.810304797	3641/7936	0.45879536
-0.9855345604	1.812246059	15027/32752	0.45881168
-0.9848729679	1.818319444	2819/6144	0.45882161
-0.9847797871	1.818069983	15031/32760	0.45882173
-0.9855196497	1.817824469	3755/8184	0.45882209
-0.9886117685	1.822362392	39/85	0.45882353
-0.9926158062	1.827949854	2821/6144	0.45914714
-0.9930572313	1.8273445	7519/16376	0.45914753
-0.994338176	1.828934099	1877/4088	0.45914873
-0.992353896	1.831855437	15045/32767	0.45915098
-0.9918463417	1.83232464	933/2032	0.45915354
-0.990626821	1.834359236	2507/5460	0.45915751
-0.990825956	1.835158512	15031/32736	0.45915811
-0.9887601027	1.835388543	14987/32640	0.45916054
-0.9861762251	1.834561051	3761/8191	0.4591625
-0.9845634781	1.834509525	911/1984	0.45917339
-0.9826226508	1.83610644	15017/32704	0.45917931
-0.9826548422	1.836433536	2351/5120	0.45917969
-0.9814626614	1.838065444	14929/32512	0.4591843
-0.9826525895	1.839161924	11285/24576	0.45918783
-0.9826151955	1.839024025	2149/4680	0.45918803
-0.9833852725	1.840312794	1249/2720	0.45919118
-0.9838991239	1.841606563	15045/32764	0.45919302
-0.9809620161	1.841841621	7523/16383	0.45919551
-0.9778046142	1.840879832	14577/31744	0.45920489
-0.9731387196	1.844538903	1003/2184	0.45924908
-0.972028581	1.844728179	7517/16368	0.45924976
-0.9693816837	1.843798137	1499/3264	0.45925245
-0.9686496504	1.845918006	15047/32764	0.45925406
-0.9667336879	1.854194858	14579/31744	0.45926789
-0.9663775301	1.852420848	11287/24576	0.45926921
-0.9662067864	1.851894812	327/712	0.45926966
-0.9694701481	1.85224278	15049/32767	0.45927305
-0.9701804868	1.854276258	3733/8128	0.45927657
-0.9709180892	1.853544438	4703/10240	0.45927734
-0.9722024922	1.852956509	7523/16380	0.45927961
-0.9730305996	1.852845513	485/1056	0.4592803
-0.9731668841	1.854870983	4997/10880	0.45928309
-0.979658216	1.858436917	3645/7936	0.4592994
-0.9792896332	1.857444503	15021/32704	0.45930161
-0.9806830382	1.855023206	14933/32512	0.45930733
-0.9795004213	1.854658652	1411/3072	0.4593099
-0.9795134924	1.854815756	15047/32760	0.45931013
-0.9790538954	1.854772414	1253/2728	0.45931085
-0.9789821856	1.853472869	937/2040	0.45931373
-0.9783103042	1.852826506	15049/32764	0.4593151
-0.9805613476	1.852172223	175/381	0.45931759
-0.9822632056	1.852467814	463/1008	0.4593254
-0.9834223021	1.850753381	3761/8188	0.45933073
-0.9831869224	1.850747123	14581/31744	0.4593309
-0.9842115969	1.849859358	1073/2336	0.45933219
-0.9860207923	1.85093632	15051/32767	0.45933409
-0.9859050957	1.852441391	7467/16256	0.45933809
-0.9867627404	1.85516539	209/455	0.45934066
-0.9878611336	1.856560213	15045/32752	0.45936126
-0.9872582898	1.85716681	7291/15872	0.4593624
-0.98713152	1.857494482	15023/32704	0.45936277
-0.9873155056	1.860783712	14935/32512	0.45936885
-0.9881537109	1.859845093	15049/32760	0.45937118
-0.988454154	1.859377188	7519/16368	0.45937195
-0.9898482883	1.859532318	147/320	0.459375
-0.9901989593	1.859133996	15051/32764	0.45937614
-0.9941774713	1.859854078	5645/12288	0.45939128
-0.9938232211	1.858819936	939/2044	0.45939335
-0.9935426189	1.858525089	14583/31744	0.4593939
-0.9955346468	1.858119838	15053/32767	0.45939512
-0.9977184909	1.858390234	1867/4064	0.45939961
-0.9991863852	1.857860805	215/468	0.45940171
-0.9998654221	1.862494772	2999/6528	0.45940564
-0.9983129681	1.86408423	3763/8191	0.45940667
-0.9959349434	1.865437983	2117/4608	0.4594184
-0.995320374	1.866517366	15047/32752	0.45942233
-0.9951090713	1.867741101	15025/32704	0.45942392
-0.9943844609	1.86847701	1823/3968	0.4594254
-0.9917022928	1.869664476	14937/32512	0.45943036
-0.9917874402	1.871185768	11291/24576	0.45943197
-0.9923654514	1.870998248	5017/10920	0.45943223
-0.9960769031	1.878744271	11293/24576	0.45951335
-0.9970037632	1.879196467	7525/16376	0.45951392
-0.9945983451	1.881930781	2151/4681	0.4595172
-0.9938202566	1.882226762	14587/31744	0.45951991
-0.9941150844	1.884447896	193/420	0.45952381
-0.9912483324	1.886273876	14999/32640	0.45952819
-0.994102834	1.895481831	2147/4672	0.45954623
-0.9990818046	1.894072654	3647/7936	0.45955141
-0.9980528316	1.892333766	14941/32512	0.4595534
-0.9974477457	1.892683548	5647/12288	0.45955404
-0.9972327699	1.893049706	3011/6552	0.45955433
-0.9963697901	1.892185918	3761/8184	0.45955523
-0.9974160343	1.88963795	15057/32764	0.45955927
-1.000408975	1.890095518	7529/16383	0.45956174
-1.003076146	1.890432842	2353/5120	0.45957031
-1.004737815	1.889546405	1853/4032	0.45957341
-1.005523364	1.886946176	7515/16352	0.45957681
-1.00710783	1.888584255	15059/32767	0.45957823
-1.007775129	1.891196748	14589/31744	0.45958291
-1.007551729	1.892568392	7471/16256	0.45958415
-1.014072551	1.89252113	15053/32752	0.45960552
-1.015474372	1.894231337	15031/32704	0.45960739
-1.020221298	1.892106858	7295/15872	0.45961442
-1.019395991	1.892569396	14943/32512	0.45961491
-1.018032475	1.892563512	7523/16368	0.45961632
-1.018094706	1.889473993	7501/16320	0.4596201
-1.017966749	1.889856165	15059/32764	0.45962031
-1.017089188	1.884640994	353/768	0.45963542
-1.017469202	1.885059845	7527/16376	0.45963605
-1.016029592	1.885897569	1879/4088	0.45963796
-1.01498918	1.884541927	15061/32767	0.45963927
-1.012987714	1.882875209	7529/16380	0.45964591
-1.013047803	1.882853189	14591/31744	0.45964592
-1.011075514	1.882081521	15047/32736	0.45964687
-1.015581006	1.879591545	5001/10880	0.45965074
-1.01614346	1.878554256	3765/8191	0.45965084
-1.020088451	1.876663394	14827/32256	0.45966642
-1.01981895	1.876675168	15055/32752	0.45966659
-1.020230454	1.875307853	4707/10240	0.45966797
-1.019859599	1.874948001	15033/32704	0.45966854
-1.020791524	1.870699744	11297/24576	0.45967611
-1.020893437	1.871224025	15059/32760	0.45967643
-1.018016916	1.865341953	3751/8160	0.45968137
-1.026701914	1.86587475	7531/16383	0.45968382
-1.036929396	1.877784594	941/2047	0.45969712
-1.044982947	1.879420518	15061/32760	0.45973748
-1.044282166	1.881199865	14947/32512	0.45973794
-1.044660094	1.882580186	7525/16368	0.45973851
-1.042229317	1.886364894	15063/32764	0.4597424
-1.042714803	1.887201691	2501/5440	0.45974265
-1.045527047	1.895034263	11299/24576	0.45975749
-1.044181336	1.894570181	7529/16376	0.45975818
-1.046001302	1.893199039	7415/16128	0.45975942
-1.046046799	1.891427133	537/1168	0.45976027
-1.051759912	1.894092183	1177/2560	0.45976563
-1.052954862	1.892435776	7531/16380	0.45976801
-1.055211185	1.891154904	3737/8128	0.4597687
-1.056622276	1.889291131	5017/10912	0.45976906
-1.056275928	1.897345118	14595/31744	0.45977193
-1.064025564	1.90626557	15059/32752	0.45978872
-1.067913506	1.905065034	14831/32256	0.45979043
-1.073052215	1.900637623	5021/10920	0.45979853
-1.070520684	1.899177776	14949/32512	0.45979946
-1.069363478	1.899590745	3763/8184	0.45979961
-1.070675339	1.891449474	3649/7936	0.45980343
-1.06811385	1.888505885	469/1020	0.45980392
-1.082779748	1.890028688	2511/5461	0.4598059
-1.104020301	1.889730049	3765/8188	0.45981925
-1.066315224	1.936553194	15039/32704	0.45985201
-1.067689165	1.934567687	2119/4608	0.45985243
-1.060442702	1.933116678	3013/6552	0.45985958
-1.059408445	1.937374994	14951/32512	0.45986097
-1.054744577	1.940695765	15067/32764	0.45986449
-0.9951230152	1.956653697	5653/12288	0.46004232
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-0.99084979	1.958064512	1255/2728	0.46004399
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-0.988540779	1.953765256	15073/32764	0.46004761
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-0.9848072106	1.939024979	15075/32767	0.46006653
-0.986374377	1.938127506	265/576	0.46006944
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-0.9659038269	1.938936323	14607/31744	0.46014995
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-0.8213808167	1.86380949	15115/32736	0.4617241
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-0.8167555783	1.85003471	15131/32764	0.46181785
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-0.8264379028	1.819709736	7333/15872	0.46200857
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-0.81073692	1.805009833	15023/32512	0.46207554
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-0.8029311561	1.816453031	15139/32760	0.46211844
-0.8017692864	1.818521979	61/132	0.46212121
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-0.7985351205	1.818683364	7571/16383	0.46212537
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-0.7959342658	1.816524734	7335/15872	0.46213458
-0.7947089211	1.815375078	15025/32512	0.46213706
-0.7846852134	1.808456145	3727/8064	0.46217758
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-0.7795027669	1.815429589	15143/32764	0.4621841
-0.7819163606	1.832056283	15027/32512	0.46219857
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-0.7792181084	1.821336284	15145/32767	0.46220283
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-0.786165695	1.83152812	15117/32704	0.46223704
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-0.7926579972	1.830526559	7337/15872	0.46226058
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-0.7947346142	1.83392163	15147/32767	0.46226386
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-0.7874005625	1.838913924	7515/16256	0.46229085
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-0.783424506	1.839930626	15119/32704	0.46229819
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-0.7889334678	1.850536086	135/292	0.46232877
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-0.7874003528	1.855069193	5045/10912	0.46233504
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-0.7790517038	1.850291708	14677/31744	0.46235509
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-0.7764835218	1.849455477	11363/24576	0.46236165
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-0.7639129361	1.841502732	15153/32767	0.46244697
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-0.7559727533	1.847564206	15037/32512	0.46250615
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-0.7472956456	1.852938246	15039/32512	0.46256767
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-0.7512100071	1.85584034	3671/7936	0.4625756
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-0.7417544889	1.866077874	235/508	0.46259843
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-0.730832955	1.849481094	15157/32760	0.46266789
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-0.7299567391	1.839115988	15103/32640	0.46271446
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-0.7255539829	1.838272381	5053/10920	0.46272894
-0.7224417202	1.839228146	3787/8184	0.46273216
-0.7217452366	1.841841797	15161/32764	0.46273349
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-0.7192552514	1.834598987	2527/5461	0.46273576
-0.7214689418	1.806803658	689/1488	0.46303763
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-0.5350443614	1.698485489	5053/10880	0.46443015
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-0.5323138211	1.695618232	3043/6552	0.46443834
-0.5326153001	1.694691797	15189/32704	0.4644386
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-0.5297596065	1.690848532	1267/2728	0.46444282
-0.5314093154	1.690158524	3775/8128	0.4644439
-0.5369019467	1.686354638	1189/2560	0.46445313
-0.5367604062	1.677222576	379/816	0.46446078
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-0.5529476609	1.674655761	2527/5440	0.46452206
-0.5555972257	1.672085731	491/1057	0.46452223
-0.5526167836	1.665638969	7373/15872	0.46452873
-0.5388638954	1.65439897	1087/2340	0.46452991
-0.5468086723	1.65131744	1899/4088	0.46453033
-0.5641883074	1.65082999	1873/4032	0.46453373
-0.5714292989	1.665262557	3805/8191	0.46453424
-0.5833180443	1.673754568	4757/10240	0.46455078
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-0.6410188634	1.723196153	14765/31744	0.46512727
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-0.6546132763	1.724427109	3751/8064	0.46515377
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-0.6559649869	1.71595614	1429/3072	0.46516927
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-0.6535906316	1.713048204	15241/32764	0.46517519
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-0.6562760466	1.713419064	7621/16383	0.46517732
-0.6570868022	1.713656051	3781/8128	0.46518209
-0.6576132935	1.713246217	15005/32256	0.46518477
-0.6574123926	1.711784263	14767/31744	0.46519027
-0.6583987164	1.710247384	3809/8188	0.46519297
-0.6589997417	1.711466836	949/2040	0.46519608
-0.6609088902	1.713356352	127/273	0.46520147
-0.6622241862	1.715102756	923/1984	0.46522177
-0.6627062273	1.715119638	15237/32752	0.4652235
-0.6630756311	1.716559982	3037/6528	0.46522672
-0.6634046832	1.71440562	15241/32760	0.46523199
-0.6640792885	1.71414547	15215/32704	0.46523361
-0.6640525172	1.713853911	1191/2560	0.46523437
-0.6638144714	1.712920299	15243/32764	0.46523623
-0.6642187573	1.713211031	7615/16368	0.46523705
-0.6660780744	1.713272993	7563/16256	0.4652436
-0.6658758399	1.712446659	15007/32256	0.46524678
-0.6654772608	1.71163651	5717/12288	0.46525065
-0.6643232576	1.71086346	7619/16376	0.46525403
-0.6651579265	1.710386102	15245/32767	0.46525468
-0.6658326945	1.710291238	2531/5440	0.46525735
-0.6669784809	1.707271512	7621/16380	0.46526252
-0.6673239006	1.708816014	951/2044	0.46526419
-0.668026665	1.710625107	3811/8191	0.46526676
-0.6692615111	1.711982892	15239/32752	0.46528456
-0.6693276148	1.712036404	7385/15872	0.46528478
-0.6693933004	1.712875455	15187/32640	0.46528799
-0.6702886246	1.712556043	11435/24576	0.46529134
-0.6707918912	1.711637729	5081/10920	0.46529304
-0.6713390039	1.713056271	15217/32704	0.46529477
-0.6760554078	1.713506782	15245/32764	0.46529728
-0.6707385072	1.71800514	7565/16256	0.46536663
-0.6764005707	1.725296566	15011/32256	0.46537078
-0.6782933254	1.722703198	11437/24576	0.46537272
-0.6797681889	1.721624938	7621/16376	0.46537616
-0.6802941753	1.722344706	15249/32767	0.46537675
-0.6806060761	1.723092615	14773/31744	0.46537928
-0.6807840506	1.723743277	1519/3264	0.4653799
-0.6828874803	1.721119422	121/260	0.46538462
-0.6830764658	1.722459077	3805/8176	0.4653865
-0.6838239079	1.725047787	15131/32512	0.46539739
-0.6901545236	1.715084242	15191/32640	0.46541054
-0.6898221255	1.716250425	7387/15872	0.46541079
-0.6881737051	1.718127132	5719/12288	0.46541341
-0.6870481549	1.719371998	15247/32760	0.46541514
-0.6863650663	1.717408036	15221/32704	0.46541707
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-0.6854946353	1.715484943	7625/16383	0.46542147
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-0.6832861849	1.710597498	101/217	0.46543779
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-0.684228257	1.709827344	14775/31744	0.46544229
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-0.6888999425	1.702844294	15245/32752	0.46546776
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-0.6842059858	1.703591351	15251/32764	0.46548041
-0.6840852329	1.702744048	7619/16368	0.46548143
-0.6812124279	1.701201439	7567/16256	0.46548967
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-0.6806654681	1.704876654	2179/4681	0.46549883
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-0.6794231463	1.706080728	14777/31744	0.46550529
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-0.6795942267	1.694821421	15197/32640	0.46559436
-0.6805074419	1.692836212	2179/4680	0.46559829
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-0.6811352971	1.691795024	15255/32764	0.46560249
-0.6815763297	1.692009896	7621/16368	0.46560362
-0.6838888795	1.690315581	7569/16256	0.4656127
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-0.6801605283	1.688415337	149/320	0.465625
-0.6779979695	1.687797775	7627/16380	0.46562882
-0.6790049731	1.687090176	3807/8176	0.46563112
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-0.6795447139	1.683142179	3755/8064	0.4656498
-0.6791051648	1.683028699	15251/32752	0.46565095
-0.6778695001	1.681957971	15199/32640	0.46565564
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-0.6772696023	1.684122462	339/728	0.46565934
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-0.6754505533	1.684705835	7391/15872	0.4656628
-0.6737605262	1.686074551	15257/32764	0.46566353
-0.6733587777	1.684119076	3811/8184	0.46566471
-0.6739176549	1.681494071	2543/5461	0.46566563
-0.6732159984	1.678656236	3785/8128	0.46567421
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-0.6734422188	1.671725735	15259/32767	0.46568194
-0.6759880716	1.672145989	95/204	0.46568627
-0.6797418784	1.675791052	1907/4095	0.46568987
-0.6821533791	1.677878916	1073/2304	0.46571181
-0.682228087	1.67792234	15253/32752	0.46571202
-0.6832210637	1.678375671	5067/10880	0.46571691
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-0.6845798218	1.676194282	231/496	0.46572581
-0.6866276242	1.676620235	7571/16256	0.46573573
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-0.6870863634	1.673128744	7627/16376	0.46574255
-0.6875859336	1.672501033	15023/32256	0.46574281
-0.6912293625	1.674480745	7601/16320	0.46574755
-0.6970058099	1.673349925	2543/5460	0.46575092
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-0.7037323111	1.687916942	3757/8064	0.46589782
-0.7048396944	1.684791938	5069/10880	0.46590074
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-0.7036271143	1.6835438	15263/32760	0.46590354
-0.7047516865	1.683029614	15237/32704	0.46590631
-0.7047881156	1.68221129	15265/32764	0.4659077
-0.7052781791	1.682705139	41/88	0.46590909
-0.7058438296	1.683209008	7633/16383	0.46590978
-0.7064210686	1.683840266	7395/15872	0.46591482
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-0.7079351137	1.682814026	3787/8128	0.46592028
-0.7082943937	1.681035248	3815/8188	0.46592574
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-0.7093506539	1.682304446	1901/4080	0.46593137
-0.7100914197	1.684812831	15149/32512	0.46595103
-0.715823867	1.685318621	15261/32752	0.46595628
-0.7180097436	1.681443521	15209/32640	0.46596201
-0.7157246593	1.682456723	3053/6552	0.46596459
-0.7153019296	1.680327794	2177/4672	0.46596747
-0.7142214512	1.680130047	15267/32764	0.46596875
-0.7146823331	1.675671137	1849/3968	0.46597782
-0.712953283	1.67730136	2863/6144	0.46598307
-0.7116021494	1.6783657	7631/16376	0.46598681
-0.7109289618	1.676936892	15031/32256	0.46599082
-0.7099265444	1.676770928	507/1088	0.46599265
-0.7083532281	1.677058784	7633/16380	0.46599512
-0.7091997058	1.675633218	1905/4088	0.46599804
-0.7102029732	1.674459713	3817/8191	0.46599927
-0.7114774422	1.673373204	14793/31744	0.46600932
-0.7120474375	1.671849466	15151/32512	0.46601255
-0.7097017902	1.671366851	15263/32752	0.46601734
-0.7091696193	1.670133562	1879/4032	0.46602183
-0.7084340683	1.670071437	15211/32640	0.46602328
-0.7072526907	1.671257933	727/1560	0.46602564
-0.7060301157	1.669215487	15241/32704	0.46602862
-0.704613665	1.667737921	15269/32764	0.46602979
-0.7065031217	1.667617008	1907/4092	0.46603128
-0.7077699622	1.667849891	2545/5461	0.46603186
-0.7099586523	1.666445728	947/2032	0.46604331
-0.7195421244	1.665983528	7517/16128	0.46608383
-0.7188218174	1.664155209	5071/10880	0.46608456
-0.7181854494	1.663024646	15269/32760	0.46608669
-0.71890863	1.661726309	15243/32704	0.46608977
-0.7186077178	1.661040585	15271/32764	0.46609083
-0.7196710692	1.660841269	2543/5456	0.46609238
-0.7180083424	1.656179175	3699/7936	0.46610383
-0.7178508341	1.657404283	7577/16256	0.46610482
-0.7183298119	1.657550394	11455/24576	0.46610514
-0.7162199707	1.658811988	7633/16376	0.46610894
-0.7161437444	1.658036975	15273/32767	0.4661092
-0.7149728377	1.657268949	4773/10240	0.46611328
-0.7137459171	1.657667234	7607/16320	0.4661152
-0.7122657854	1.657810207	509/1092	0.46611722
-0.7124041155	1.656162043	3811/8176	0.46612035
-0.7094514334	1.651288274	14797/31744	0.46613533
-0.7099585443	1.65148739	15155/32512	0.46613558
-0.7088237901	1.653608782	15267/32752	0.46613947
-0.7078408099	1.655184065	179/384	0.46614583
-0.7089138101	1.656149498	15271/32760	0.46614774
-0.7081351085	1.657812871	15245/32704	0.46615093
-0.7081062544	1.659269261	15273/32764	0.46615187
-0.7021265117	1.658575883	3789/8128	0.46616634
-0.7026997165	1.659160799	7399/15872	0.46616683
-0.6989839557	1.658980801	15275/32767	0.46617023
-0.6961388175	1.655988951	15037/32256	0.46617684
-0.6997414152	1.652139759	1909/4095	0.46617827
-0.7017774898	1.649229589	15157/32512	0.4661971
-0.7020664496	1.648588769	14799/31744	0.46619834
-0.7017985412	1.647213617	15269/32752	0.46620054
-0.700910534	1.645591244	15217/32640	0.46620711
-0.7002362116	1.645954321	7519/16128	0.46620784
-0.6973886175	1.646030871	15247/32704	0.46621208
-0.6954761073	1.646002033	15275/32764	0.46621292
-0.6920572012	1.642786379	7579/16256	0.46622785
-0.6909280828	1.645482875	925/1984	0.46622984
-0.687751842	1.64712661	7635/16376	0.46623107
-0.6867810732	1.644052598	15277/32767	0.46623127
-0.6806321227	1.644520559	7609/16320	0.46623775
-0.6668148413	1.638187001	1091/2340	0.46623932
-0.6862205518	1.631891276	3819/8191	0.46624344
-0.6920110979	1.629928195	15159/32512	0.46625861
-0.6935274424	1.626610544	14801/31744	0.46626134
-0.6938716652	1.626141835	15271/32752	0.4662616
-0.697238128	1.623788929	11459/24576	0.4662679
-0.695598719	1.62374143	5073/10880	0.46626838
-0.6959678721	1.616623403	235/504	0.46626984
-0.7077859397	1.613744886	15249/32704	0.46627324
-0.7141957536	1.620608891	15277/32764	0.46627396
-0.7115771262	1.630473277	159/341	0.46627566
-0.7197191406	1.637031819	11461/24576	0.46634928
-0.7215543175	1.635472085	7637/16376	0.4663532
-0.7216075075	1.636160718	2183/4681	0.46635334
-0.7219404857	1.636931106	3701/7936	0.46635585
-0.7238079549	1.635099242	2537/5440	0.46636029
-0.7250064298	1.634848087	7639/16380	0.46636142
-0.7247483111	1.63582005	2149/4608	0.46636285
-0.7261558667	1.636326911	3813/8176	0.46636497
-0.7321260803	1.638440216	15163/32512	0.46638164
-0.7317893833	1.6359123	15275/32752	0.46638373
-0.7335071071	1.632927668	14805/31744	0.46638735
-0.7309713185	1.63337279	5731/12288	0.46638997
-0.7301434779	1.633687476	15223/32640	0.46639093
-0.7288305668	1.633329427	5093/10920	0.46639194
-0.7292952854	1.631883583	3761/8064	0.46639385
-0.7271909398	1.631453026	2179/4672	0.46639555
-0.7265815433	1.630166618	15281/32764	0.46639604
-0.7282738056	1.628531512	347/744	0.46639785
-0.729953002	1.629025967	2547/5461	0.4663981
-0.731756309	1.626420974	597/1280	0.46640625
-0.7290792136	1.621533092	3791/8128	0.4664124
-0.7320896472	1.618759694	3819/8188	0.46641426
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-0.7729633019	1.611298047	237/508	0.46653543
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-0.7634131951	1.616215543	1019/2184	0.46657509
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-0.7646536141	1.617817558	15259/32704	0.46657901
-0.7638297882	1.618128097	1075/2304	0.46657986
-0.766033477	1.621381351	11467/24576	0.46659342
-0.7676860971	1.619352568	7585/16256	0.46659695
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-0.7697858806	1.621363324	2389/5120	0.46660156
-0.7739544843	1.620751702	1523/3264	0.46660539
-0.7734392522	1.621738409	7643/16380	0.46660562
-0.773059183	1.62276602	3703/7936	0.46660786
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-0.7758133293	1.628397001	15171/32512	0.46662771
-0.7764222224	1.628899011	15283/32752	0.46662799
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-0.7778292271	1.625241125	5077/10880	0.46663603
-0.7787320155	1.625186014	15287/32760	0.46663614
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-0.7828141558	1.62002912	15261/32704	0.46664017
-0.7862707061	1.623420497	3763/8064	0.46664187
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-0.7840019594	1.626952322	7645/16383	0.46664225
-0.7953720456	1.637980772	3793/8128	0.46665846
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-0.7947405715	1.636330296	15291/32767	0.46665853
-0.78837691	1.659828814	7/15	0.46666667
-0.7562337702	1.680121648	113/240	0.47083333
-0.7667545872	1.695020942	15421/32752	0.47084148
-0.776316571	1.698099482	3085/6552	0.4708486
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-0.7835633258	1.702808981	2569/5456	0.47085777
-0.7855959604	1.708105012	3797/8064	0.47085813
-0.7919082867	1.710025981	15399/32704	0.47085983
-0.7930717851	1.704679569	14947/31744	0.47086064
-0.794230495	1.701593863	5123/10880	0.47086397
-0.7926253818	1.699392182	2893/6144	0.47086589
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-0.7938185809	1.696791412	7711/16376	0.47087201
-0.7950019326	1.697044477	15309/32512	0.47087229
-0.799562317	1.694890081	857/1820	0.47087912
-0.7991175995	1.699191687	275/584	0.47089041
-0.8007705179	1.701844633	3737/7936	0.47089214
-0.80079918	1.704343345	1537/3264	0.47089461
-0.8043565044	1.702104755	2411/5120	0.47089844
-0.805577597	1.702728874	15423/32752	0.47090254
-0.8071272946	1.70294941	7655/16256	0.47090305
-0.8077932482	1.70054217	11573/24576	0.47090658
-0.8081035961	1.699355799	15427/32760	0.47090965
-0.8118710972	1.697705786	15429/32764	0.4709132
-0.8118387442	1.70100488	7715/16383	0.47091497
-0.8107796533	1.700775242	1927/4092	0.47091887
-0.8112627164	1.702733714	1085/2304	0.47092014
-0.81054374	1.703339407	15401/32704	0.47092099
-0.813027221	1.704194767	14949/31744	0.47092364
-0.8124879065	1.705534293	15371/32640	0.47092525
-0.8196797239	1.712584718	14467/30720	0.47093099
-0.8189450387	1.711619121	15431/32767	0.47093112
-0.8106570807	1.708901519	3617/7680	0.47096354
-0.8098467254	1.70880647	15425/32752	0.47096361
-0.807156534	1.711672301	957/2032	0.47096457
-0.8238426444	1.721089994	15431/32764	0.47097424
-0.8202067664	1.726573618	7709/16368	0.47097996
-0.8380054754	1.715227749	15373/32640	0.47098652
-0.8370960525	1.716673984	14951/31744	0.47098664
-0.8341369286	1.71848378	11575/24576	0.47098796
-0.8315672699	1.713580166	15433/32767	0.47099216
-0.8328582783	1.71507843	7713/16376	0.47099414
-0.8343648554	1.710942779	15313/32512	0.47099532
-0.8324607302	1.710428921	4823/10240	0.47099609
-0.8307071587	1.706791448	1543/3276	0.47100122
-0.8402149467	1.706852489	3851/8176	0.47101272
-0.840789518	1.702809254	15193/32256	0.47101314
-0.8367511354	1.693483287	7687/16320	0.47101716
-0.8322780616	1.695174442	15427/32752	0.47102467
-0.8294225093	1.697436622	1447/3072	0.47102865
-0.8288408736	1.698305472	1187/2520	0.47103175
-0.8257321277	1.699647681	15433/32764	0.47103528
-0.8255208092	1.696742643	7717/16383	0.47103705
-0.8267327058	1.696641604	1285/2728	0.47104106
-0.8264304575	1.693933833	15405/32704	0.4710433
-0.8253767061	1.694371257	7597/16128	0.47104415
-0.8235375118	1.692563584	1025/2176	0.47104779
-0.822398403	1.694029841	14953/31744	0.47104965
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-0.8228531884	1.689726003	15315/32512	0.47105684
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-0.8286083561	1.690032739	961/2040	0.47107843
-0.8298196692	1.687691877	7477/15872	0.47108115
-0.831694368	1.687761949	15429/32752	0.47108574
-0.8327292921	1.685097266	3829/8128	0.4710876
-0.8298288413	1.683250567	603/1280	0.47109375
-0.8289377197	1.682406849	15435/32764	0.47109633
-0.8309870794	1.681322701	701/1488	0.47110215
-0.8307979502	1.679040987	2201/4672	0.47110445
-0.8295054641	1.679346136	3799/8064	0.47110615
-0.8284632028	1.678656598	15377/32640	0.47110907
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-0.8269639051	1.680066507	14955/31744	0.47111265
-0.8262824531	1.678222131	15437/32767	0.47111423
-0.8268845527	1.678145546	7715/16376	0.47111627
-0.8259764557	1.676510404	15317/32512	0.47111836
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-0.8295074891	1.674688675	3859/8191	0.47112685
-0.8297727109	1.675813608	963/2044	0.47113503
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-0.8320333651	1.675820982	2563/5440	0.47113971
-0.8328117441	1.674062259	3739/7936	0.47114415
-0.8333551731	1.674839584	15431/32752	0.4711468
-0.834245482	1.673569374	7659/16256	0.47114911
-0.834043663	1.672977062	11579/24576	0.47115072
-0.8342918167	1.671948814	49/104	0.47115385
-0.8361293278	1.669676149	15437/32764	0.47115737
-0.8378644138	1.67123837	2573/5461	0.47115913
-0.8379172363	1.678783803	2571/5456	0.47122434
-0.843781663	1.681880937	15411/32704	0.47122676
-0.8466303242	1.676678713	475/1008	0.47123016
-0.8447039187	1.673491583	5127/10880	0.47123162
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-0.8446666623	1.671887966	7717/16376	0.4712384
-0.8447256689	1.671507911	14959/31744	0.47123866
-0.8449916242	1.669537408	15321/32512	0.47124139
-0.8445527029	1.668526138	2573/5460	0.47124542
-0.8469431976	1.668342827	14477/30720	0.47125651
-0.8506312663	1.666690232	3853/8176	0.47125734
-0.8461940821	1.661660377	7691/16320	0.47126225
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-0.8424853358	1.664129917	7661/16256	0.47127215
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-0.8415056591	1.665905923	15441/32764	0.47127945
-0.8408474057	1.664883423	7721/16383	0.47128121
-0.8409840209	1.664209719	3857/8184	0.47128543
-0.8399135464	1.663795746	15413/32704	0.47128792
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-0.8385459827	1.664472639	15383/32640	0.47129289
-0.8375192756	1.664145288	15443/32767	0.47129734
-0.8374324879	1.663248033	14961/31744	0.47130166
-0.8373559156	1.6628646	15323/32512	0.4713029
-0.8384528249	1.662088194	14479/30720	0.47132161
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-0.8381263945	1.660339982	641/1360	0.47132353
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-0.8354446113	1.659705987	7481/15872	0.47133317
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-0.8355457676	1.660272623	5147/10920	0.471337
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-0.8340543676	1.660512067	7715/16368	0.47134653
-0.8334686328	1.661131725	15415/32704	0.47134907
-0.8339916223	1.66205554	181/384	0.47135417
-0.8342203586	1.662822166	15445/32767	0.47135838
-0.8339789746	1.66275156	7719/16376	0.47136053
-0.8338364527	1.663848769	15325/32512	0.47136442
-0.8340551173	1.663829768	14963/31744	0.47136467
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-0.8320977245	1.663290343	3861/8191	0.47137102
-0.8321144555	1.662612162	1927/4088	0.47137965
-0.8310335563	1.662231376	15205/32256	0.47138517
-0.8305520849	1.66242605	4827/10240	0.47138672
-0.8298122462	1.661933898	15439/32752	0.47139106
-0.8288719763	1.662830389	11585/24576	0.47139486
-0.8290982954	1.662816448	7663/16256	0.47139518
-0.8292405896	1.663401272	3741/7936	0.47139617
-0.8256587817	1.663268689	15445/32764	0.47140154
-0.8268773839	1.661569636	7723/16383	0.47140328
-0.8278292985	1.660625577	15417/32704	0.47141023
-0.8274557323	1.659069646	5129/10880	0.47141544
-0.8266986508	1.658163634	7603/16128	0.47141617
-0.8293422218	1.657391821	7241/15360	0.47141927
-0.8290848142	1.657566976	15447/32767	0.47141942
-0.8296502125	1.658310065	965/2047	0.47142159
-0.8305480257	1.659360562	15441/32752	0.47145213
-0.8310907373	1.657768364	479/1016	0.47145669
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-0.8313897847	1.657367833	7483/15872	0.47145917
-0.8314568597	1.656605217	15447/32764	0.47146258
-0.8326052878	1.656596244	7717/16368	0.47146872
-0.8327725912	1.655640492	15419/32704	0.47147138
-0.8315469554	1.655386579	15389/32640	0.47147672
-0.8311937567	1.655419172	1901/4032	0.47147817
-0.8307606301	1.655102835	2207/4681	0.47148045
-0.8308557702	1.654905056	7721/16376	0.47148266
-0.8295835659	1.654651776	15329/32512	0.47148745
-0.8297489484	1.654103197	7723/16380	0.47148962
-0.8297918695	1.653721188	14967/31744	0.47149068
-0.8307691917	1.652803432	3855/8176	0.47150196
-0.830287725	1.652067599	513/1088	0.47150735
-0.8297489055	1.652010724	15209/32256	0.47150918
-0.8293891928	1.651408561	15443/32752	0.47151319
-0.828736944	1.651961892	2897/6144	0.47151693
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-0.8272399137	1.652799683	15449/32764	0.47152362
-0.8272163693	1.651599851	2575/5461	0.47152536
-0.8274799816	1.651195936	3859/8184	0.47152981
-0.8257577481	1.650038545	15391/32640	0.47153799
-0.8262745285	1.647439316	15451/32767	0.47154149
-0.8266660412	1.647721785	3861/8188	0.47154372
-0.8300289564	1.64714146	15331/32512	0.47154897
-0.829683631	1.647839798	7243/15360	0.47154948
-0.8292414343	1.648312821	1931/4095	0.47155067
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-0.8311493345	1.648359796	3833/8128	0.47157972
-0.8315101296	1.648330688	2207/4680	0.4715812
-0.8316162532	1.648096289	4829/10240	0.47158203
-0.831885131	1.647597253	15451/32764	0.47158467
-0.8321183869	1.647588297	7485/15872	0.47158518
-0.8327635286	1.648157161	83/176	0.47159091
-0.8331659769	1.647798628	15423/32704	0.47159369
-0.8332882312	1.64680854	5795/12288	0.47159831
-0.8328373547	1.646758882	5131/10880	0.47159926
-0.8330172545	1.644918683	3803/8064	0.47160218
-0.8339206418	1.645846095	7723/16376	0.47160479
-0.8363346424	1.64503941	515/1092	0.47161172
-0.8371009217	1.646994621	1811/3840	0.47161458
-0.8364249797	1.648899522	241/511	0.47162427
-0.8357464495	1.650767905	3623/7680	0.47174479
-0.8361634939	1.651965391	551/1168	0.47174658
-0.837918255	1.652471258	7699/16320	0.47175245
-0.8395496585	1.652483642	15217/32256	0.47175719
-0.8396460752	1.652074501	15451/32752	0.47175745
-0.8393186367	1.650859664	5797/12288	0.47176107
-0.8392644939	1.650405906	7669/16256	0.47176427
-0.8393005821	1.650383379	3091/6552	0.47176435
-0.8395655816	1.649620868	15457/32764	0.47176779
-0.8401082028	1.64989214	7729/16383	0.47176952
-0.8403799829	1.650193762	117/248	0.47177419
-0.8408711576	1.649860843	15429/32704	0.47177715
-0.8408668162	1.649769144	4831/10240	0.47177734
-0.8410985855	1.64886755	5133/10880	0.47178309
-0.841670028	1.648730889	15459/32767	0.47178564
-0.8417226144	1.648977074	3863/8188	0.47178798
-0.8418037952	1.649012153	1087/2304	0.47178819
-0.8425248329	1.650175992	7247/15360	0.4718099
-0.8443971795	1.650978675	385/816	0.47181373
-0.8465435812	1.651841222	15453/32752	0.47181851
-0.8455946954	1.648305059	1189/2520	0.4718254
-0.8455723164	1.647952229	3835/8128	0.47182579
-0.8447332715	1.647518728	15459/32764	0.47182884
-0.8444144222	1.645690298	7489/15872	0.4718372
-0.8442970925	1.645980621	15431/32704	0.47183831
-0.8435602284	1.646719722	15401/32640	0.47184436
-0.8430876742	1.646671028	15461/32767	0.47184668
-0.843069394	1.646407384	7727/16376	0.47184905
-0.842841095	1.646332865	3805/8064	0.4718502
-0.841950334	1.646039768	7729/16380	0.47185592
-0.8419053232	1.645863032	15341/32512	0.47185655
-0.8424092806	1.645206422	3865/8191	0.47185936
-0.8429225761	1.644856222	14979/31744	0.4718687
-0.8424193018	1.643997379	151/320	0.471875
-0.8423192022	1.643281596	15455/32752	0.47187958
-0.8419135137	1.64323957	15221/32256	0.4718812
-0.8415974729	1.643336718	11597/24576	0.47188314
-0.8411378408	1.643179997	5153/10920	0.47188645
-0.8407847173	1.643085272	7671/16256	0.4718873
-0.8405523407	1.642281232	15461/32764	0.47188988
-0.8413253913	1.642172598	2577/5461	0.47189159
-0.8417461371	1.642243779	1931/4092	0.47189638
-0.8419612382	1.641778605	15433/32704	0.47189946
-0.8420477731	1.641588435	3745/7936	0.4719002
-0.8423002503	1.640506868	15403/32640	0.47190564
-0.8431889739	1.640517564	14497/30720	0.47190755
-0.8430179515	1.640627101	2209/4681	0.47190771
-0.8437465394	1.642000135	7249/15360	0.4719401
-0.844246851	1.642416079	15457/32752	0.47194064
-0.8455696901	1.641662003	15223/32256	0.4719432
-0.8450956134	1.640538547	15461/32760	0.4719475
-0.8451135572	1.640071997	959/2032	0.47194882
-0.8450366913	1.639761436	15463/32764	0.47195092
-0.8463407958	1.63897182	2575/5456	0.47195748
-0.8453118474	1.638385763	2205/4672	0.47196062
-0.8445504328	1.638162928	7491/15872	0.47196321
-0.8446408114	1.638533928	11599/24576	0.47196452
-0.844285456	1.638920191	1027/2176	0.47196691
-0.8439797741	1.638684015	15465/32767	0.47196875
-0.8439239593	1.638420052	7729/16376	0.47197118
-0.8436164066	1.638432156	4833/10240	0.47197266
-0.8432892059	1.638433902	1903/4032	0.47197421
-0.8429588265	1.638284917	859/1820	0.47197802
-0.842781359	1.637956568	15345/32512	0.47197958
-0.8428262605	1.63684796	3859/8176	0.47199119
-0.8421033772	1.636671194	14983/31744	0.47199471
-0.8420191842	1.637204152	7703/16320	0.47199755
-0.8414779506	1.638010912	2209/4680	0.47200855
-0.8415065427	1.638392893	7673/16256	0.47201033
-0.8412516556	1.63861498	15465/32764	0.47201196
-0.8407959892	1.638285525	7733/16383	0.47201367
-0.8405613593	1.637954792	3863/8184	0.47201857
-0.84006796	1.638189785	15437/32704	0.47202177
-0.8396227485	1.638671941	1873/3968	0.47202621
-0.8389303848	1.639431565	15407/32640	0.47202819
-0.8382224724	1.638304711	15467/32767	0.47202979
-0.8372728768	1.636480298	7613/16128	0.47203621
-0.8401143455	1.635551531	14985/31744	0.47205771
-0.839999851	1.635187688	321/680	0.47205882
-0.8408857944	1.634907317	15461/32752	0.47206277
-0.839955433	1.634368682	15227/32256	0.47206721
-0.8397119716	1.633950284	1031/2184	0.4720696
-0.8395084964	1.633837384	2417/5120	0.47207031
-0.838887441	1.633833851	3837/8128	0.47207185
-0.8390434135	1.633392189	15467/32764	0.47207301
-0.8397840914	1.632317299	7727/16368	0.47207967
-0.8390375195	1.632067116	15439/32704	0.47208293
-0.8383816546	1.631778277	5801/12288	0.47208659
-0.8377154941	1.632438032	7493/15872	0.47208921
-0.8375569739	1.632876987	15409/32640	0.47208946
-0.837144781	1.631341186	499/1057	0.47209082
-0.8374079744	1.630735384	7731/16376	0.47209331
-0.8375899777	1.627656801	7733/16380	0.47210012
-0.8404761672	1.628052025	15349/32512	0.47210261
-0.8399737851	1.628442634	14503/30720	0.47210286
-0.8394480353	1.6288481	3867/8191	0.47210353
-0.8404395501	1.629621815	965/2044	0.4721135
-0.8417523059	1.628780367	1541/3264	0.4721201
-0.8419182985	1.629094587	14987/31744	0.47212072
-0.8423660353	1.629727388	15463/32752	0.47212384
-0.8429589301	1.628939689	11603/24576	0.47212728
-0.8435118479	1.627586514	15229/32256	0.47212922
-0.8438368004	1.628628918	15467/32760	0.47213065
-0.84533525	1.629152857	15469/32764	0.47213405
-0.8450141522	1.630314108	1813/3840	0.47213542
-0.8447204116	1.630044912	7735/16383	0.47213575
-0.8440636664	1.631332218	161/341	0.47214076
-0.8433027602	1.632379472	7253/15360	0.47220052
-0.8449326733	1.633161495	11605/24576	0.47220866
-0.8453360916	1.632633182	15413/32640	0.47221201
-0.8455130261	1.63290782	15473/32767	0.4722129
-0.8455514714	1.633112891	7495/15872	0.47221522
-0.845640142	1.633138343	7733/16376	0.47221544
-0.8464884797	1.632987635	17/36	0.47222222
-0.8466786508	1.633610191	5153/10912	0.4722324
-0.8464315908	1.633685604	14507/30720	0.47223307
-0.8472590291	1.634421387	3861/8176	0.47223581
-0.8480530862	1.633343276	2569/5440	0.47224265
-0.8486828043	1.632971405	15467/32752	0.47224597
-0.8485351127	1.632680689	14991/31744	0.47224672
-0.8480418326	1.632662964	5803/12288	0.47224935
-0.8478221852	1.632372251	1719/3640	0.47225275
-0.8477735327	1.632303758	15233/32256	0.47225322
-0.8475803894	1.631836881	15473/32764	0.47225613
-0.8475997154	1.631765489	7677/16256	0.4722564
-0.8480498392	1.631728287	2579/5461	0.47225783
-0.8485087021	1.631719973	3865/8184	0.47226295
-0.848563941	1.631292066	1209/2560	0.47226563
-0.8464884797	1.632987635	15445/32704	0.47226639
-0.8488868143	1.629708368	3083/6528	0.47227328
-0.8490201787	1.630084407	15475/32767	0.47227393
-0.849211478	1.630359371	3867/8188	0.4722765
-0.8496010742	1.630222371	937/1984	0.47227823
-0.8502183831	1.631176612	7723/16352	0.47229697
-0.8499460017	1.631293623	14509/30720	0.47229818
-0.8516335314	1.631419389	1927/4080	0.47230392
-0.8523495921	1.631980376	15469/32752	0.47230703
-0.8523829747	1.630638923	14993/31744	0.47230973
-0.8520655596	1.630246956	15473/32760	0.4723138
-0.8518304004	1.629868956	15235/32256	0.47231523
-0.8519665609	1.629358715	3839/8128	0.47231791
-0.8528275494	1.628824778	2577/5456	0.47232405
-0.8520012541	1.628435789	15447/32704	0.47232754
-0.8516570858	1.628429484	1451/3072	0.47233073
-0.8507868398	1.628472368	5139/10880	0.47233456
-0.850990185	1.628238744	2211/4681	0.47233497
-0.8511124299	1.62786059	7735/16376	0.47233757
-0.8502494532	1.627693738	7497/15872	0.47234123
-0.850292633	1.626616653	2579/5460	0.47234432
-0.8504555867	1.625194671	3809/8064	0.47234623
-0.8515763413	1.626254955	3869/8191	0.4723477
-0.851808312	1.62660547	15463/32736	0.47235459
-0.8529283298	1.626369784	1931/4088	0.47235812
-0.8532115795	1.625314805	4837/10240	0.47236328
-0.8536146398	1.624420375	7709/16320	0.4723652
-0.8545166528	1.624632199	15471/32752	0.4723681
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-0.8531726101	1.623475268	14995/31744	0.47237273
-0.8542190847	1.62245542	3095/6552	0.47237485
-0.8557751848	1.621181899	15477/32764	0.47237822
-0.8571903755	1.622692952	7679/16256	0.47237943
-0.8561572708	1.622582066	7739/16383	0.47237991
-0.8562323247	1.623849499	1933/4092	0.47238514
-0.8576184579	1.624327737	2207/4672	0.4723887
-0.8590738664	1.626361539	907/1920	0.47239583
-0.8589761828	1.626011716	15479/32767	0.47239601
-0.8576361261	1.626689189	967/2047	0.47239863
-0.8565843922	1.627561894	257/544	0.47242647
-0.8562669338	1.627010254	14513/30720	0.47242839
-0.8554857494	1.627811084	15473/32752	0.47242916
-0.8576069791	1.629323851	14997/31744	0.47243574
-0.857632128	1.629543235	737/1560	0.4724359
-0.8590866125	1.630082315	2177/4608	0.47243924
-0.8590260536	1.630127088	15479/32764	0.47243926
-0.8588569486	1.632751509	61/129	0.47286822
-0.8582814216	1.632727836	7687/16256	0.47287156
-0.8589997048	1.635559565	2179/4608	0.47287326
-0.8605327921	1.636697305	15011/31744	0.47287676
-0.8601673441	1.636936521	15465/32704	0.47287794
-0.8617425091	1.639681647	15495/32767	0.4728843
-0.861508217	1.639290544	1029/2176	0.47288603
-0.8580342928	1.639552754	227/480	0.47291667
-0.8567852878	1.639855285	15489/32752	0.47291768
-0.8586476492	1.643414191	15493/32760	0.4729243
-0.8600547995	1.644698702	15495/32764	0.4729276
-0.8581698896	1.645181171	961/2032	0.47293307
-0.8571600922	1.64836607	7741/16368	0.472935
-0.8634070646	1.650404952	15467/32704	0.47293909
-0.864880047	1.647332934	15013/31744	0.47293977
-0.8636205639	1.646662952	11623/24576	0.47294108
-0.8646264105	1.644565338	15497/32767	0.47294534
-0.8647026082	1.645310575	15437/32640	0.4729473
-0.8659651881	1.643943876	4843/10240	0.47294922
-0.8672138812	1.642384119	7747/16380	0.47295482
-0.8686877226	1.644237692	5161/10912	0.47296554
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-0.8747599008	1.642370586	3867/8176	0.47296967
-0.8721898091	1.6396707	7507/15872	0.47297127
-0.8707837049	1.637582611	15491/32752	0.47297875
-0.8693987101	1.638449478	1453/3072	0.47298177
-0.8687302682	1.638231249	1033/2184	0.47298535
-0.8675602027	1.637725801	15497/32764	0.47298865
-0.8681893703	1.63692012	2583/5461	0.47299029
-0.8687060384	1.636887789	7689/16256	0.47299459
-0.8692912145	1.636527552	3871/8184	0.47299609
-0.8688654131	1.635983643	15257/32256	0.47299727
-0.8688600707	1.635022775	15469/32704	0.47300024
-0.8678273542	1.634856731	15015/31744	0.47300277
-0.8687618859	1.633418801	15439/32640	0.47300858
-0.869104047	1.633723635	3873/8188	0.47300928
-0.8715999221	1.632786489	14531/30720	0.47301432
-0.8711895814	1.633757867	149/315	0.47301587
-0.8708834853	1.635083645	1105/2336	0.47303082
-0.8741689112	1.635167117	193/408	0.47303922
-0.8750019193	1.635707649	15493/32752	0.47303981
-0.8742561642	1.632322203	15497/32760	0.4730464
-0.8738855813	1.632058457	1211/2560	0.47304687
-0.8738190145	1.631322693	15499/32764	0.47304969
-0.8757945842	1.630095428	2581/5456	0.47305718
-0.874480019	1.629724282	15259/32256	0.47305928
-0.8743269424	1.629059414	15471/32704	0.4730614
-0.8737563208	1.629363666	5813/12288	0.47306315
-0.8729692859	1.629712087	15017/31744	0.47306578
-0.8728321629	1.628696274	15501/32767	0.47306742
-0.8731694366	1.628331689	5147/10880	0.47306985
-0.8735401152	1.628221536	7747/16376	0.47307035
-0.8734787631	1.626289194	123/260	0.47307692
-0.8754179884	1.62609475	14533/30720	0.47307943
-0.8749052694	1.626647724	3875/8191	0.47308021
-0.8747572693	1.626899516	15381/32512	0.47308686
-0.8745893816	1.627577263	15487/32736	0.47308773
-0.875985136	1.627352208	545/1152	0.47309028
-0.8763394313	1.628021619	967/2044	0.47309198
-0.8774652119	1.625987911	7509/15872	0.47309728
-0.8784874227	1.626496859	7721/16320	0.47310049
-0.8788869739	1.626761786	15495/32752	0.47310088
-0.8789663762	1.624158988	15499/32760	0.47310745
-0.8799973846	1.622781966	15501/32764	0.47311073
-0.8815909647	1.623532472	7267/15360	0.47311198
-0.8808884782	1.623755111	7751/16383	0.47311237
-0.8817353146	1.625402263	7691/16256	0.47311762
-0.8816031895	1.629805535	15503/32764	0.47317177
-0.8810765697	1.631122224	1817/3840	0.47317708
-0.8808400728	1.633703878	1923/4064	0.47317913
-0.8801114224	1.635133803	7745/16368	0.47317937
-0.8878760189	1.634739856	15263/32256	0.47318328
-0.8899626845	1.63324262	15475/32704	0.47318371
-0.8869744084	1.630725508	11629/24576	0.47318522
-0.8880419297	1.627962203	2215/4681	0.47318949
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-0.8903208684	1.629174959	7749/16376	0.47319248
-0.8912807919	1.624600271	7751/16380	0.47319902
-0.8941513791	1.626411206	14537/30720	0.47320964
-0.8939995338	1.628004797	15385/32512	0.47320989
-0.8935273969	1.628898548	15491/32736	0.47320992
-0.8883899245	1.612676941	15499/32752	0.47322301
-0.889017111	1.613126555	7723/16320	0.47322304
-0.8897042624	1.614040208	7511/15872	0.47322329
-0.8901065352	1.616301424	5815/12288	0.47322591
-0.8885560467	1.616959891	15503/32760	0.47322955
-0.8870556479	1.618122531	15505/32764	0.47323282
-0.8863476742	1.616914755	7753/16383	0.47323445
-0.8856381945	1.61387502	1291/2728	0.47324047
-0.8853130408	1.614527271	7693/16256	0.47324065
-0.8844636319	1.615687021	2423/5120	0.47324219
-0.8827888266	1.615302136	2211/4672	0.47324486
-0.8829105433	1.615830258	15265/32256	0.47324529
-0.8810483263	1.615976167	15507/32767	0.47325053
-0.8816284596	1.614825904	3875/8188	0.47325354
-0.8813126668	1.614897483	5149/10880	0.47325368
-0.8804648433	1.614711662	15023/31744	0.47325479
-0.8823563637	1.612055624	14539/30720	0.47327474
-0.8841964144	1.609706457	7739/16352	0.47327544
-0.8819974448	1.60859462	7633/16128	0.47327629
-0.8743937836	1.60878424	15501/32752	0.47328407
-0.8751934437	1.609697218	1931/4080	0.47328431
-0.8759488089	1.611329299	939/1984	0.47328629
-0.8761456012	1.612286296	443/936	0.4732906
-0.8762819674	1.613299484	15507/32764	0.47329386
-0.8749239619	1.614390188	3847/8128	0.47330217
-0.875591197	1.615235216	15479/32704	0.47330602
-0.875926547	1.614988444	727/1536	0.47330729
-0.8758814274	1.616030511	337/712	0.47331461
-0.8761250234	1.616138502	15449/32640	0.47331495
-0.8767901819	1.616796152	15025/31744	0.47331779
-0.8758131384	1.617435292	7753/16380	0.47332112
-0.8747366948	1.61711971	3877/8191	0.47332438
-0.8749004673	1.616220943	5165/10912	0.47333211
-0.8744701447	1.616482345	15389/32512	0.47333292
-0.8732785294	1.616014392	1935/4088	0.47333659
-0.8733119755	1.616768501	3817/8064	0.47333829
-0.8730056614	1.617189761	4847/10240	0.47333984
-0.8715180644	1.617295794	15503/32752	0.47334514
-0.871797952	1.617570836	515/1088	0.47334559
-0.8719199463	1.618342941	11633/24576	0.47334798
-0.8713203809	1.618969123	1723/3640	0.47335165
-0.870086125	1.619678145	15509/32764	0.4733549
-0.8699374041	1.618593593	2585/5461	0.47335653
-0.8696677828	1.617551805	7695/16256	0.47336368
-0.8690606668	1.616515665	15481/32704	0.47336717
-0.8675621707	1.616912139	15269/32256	0.4733693
-0.8682915156	1.614847528	7271/15360	0.4733724
-0.8696520076	1.614908399	969/2047	0.47337567
-0.8709796586	1.614889805	14543/30720	0.47340495
-0.8721365641	1.61414353	15505/32752	0.4734062
-0.8715171231	1.613862989	3863/8160	0.47340686
-0.870252037	1.612982107	3757/7936	0.4734123
-0.8702464629	1.612691214	1193/2520	0.4734127
-0.8695664462	1.612252139	15511/32764	0.47341594
-0.8696033597	1.609605758	2583/5456	0.47342375
-0.8688055698	1.610544072	481/1016	0.4734252
-0.8678955244	1.611209682	15483/32704	0.47342833
-0.8681169222	1.611476008	11635/24576	0.47342936
-0.8675330012	1.612152353	15513/32767	0.47343364
-0.8669831517	1.611795112	7753/16376	0.47343674
-0.8659774513	1.612355394	517/1092	0.47344322
-0.8656647939	1.612386836	15029/31744	0.4734438
-0.8658970598	1.610891993	1409/2976	0.4734543
-0.8650332773	1.610871344	15393/32512	0.47345595
-0.8642009176	1.610787462	553/1168	0.4734589
-0.8641862073	1.611771161	1909/4032	0.4734623
-0.8632215524	1.612171546	15507/32752	0.47346727
-0.8635749565	1.612357799	7727/16320	0.47346814
-0.8637832924	1.612617967	2909/6144	0.47347005
-0.8637710578	1.613185083	15511/32760	0.47347375
-0.8642229845	1.613568724	7515/15872	0.4734753
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-0.8629598323	1.613730572	7757/16383	0.47347861
-0.862185325	1.612983398	125/264	0.47348485
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-0.8608898794	1.613595546	15485/32704	0.47348948
-0.8599909788	1.612513333	3877/8188	0.4734978
-0.859464489	1.612006974	3091/6528	0.47349877
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-0.8608110029	1.611174365	277/585	0.47350427
-0.8611499155	1.611196624	15395/32512	0.47351747
-0.8618242483	1.611123197	7743/16352	0.47352006
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-0.8624042541	1.609449604	15509/32752	0.47352833
-0.8618286852	1.609426789	161/340	0.47352941
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-0.8609226142	1.609162357	4849/10240	0.47353516
-0.8604669285	1.608685139	1879/3968	0.47353831
-0.8608195432	1.607581032	7751/16368	0.47354594
-0.8598284284	1.607713531	15487/32704	0.47355064
-0.8598133638	1.607838207	5819/12288	0.47355143
-0.858991119	1.607781614	15517/32767	0.47355571
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-0.8584161228	1.606932106	15457/32640	0.47356005
-0.8584773371	1.605866874	7757/16380	0.47356532
-0.859455684	1.60568232	3879/8191	0.47356855
-0.8600641717	1.606214252	15503/32736	0.47357649
-0.8608253204	1.605716296	15397/32512	0.47357899
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-0.8650877198	1.604842686	1819/3840	0.47369792
-0.8659585507	1.605385565	5169/10912	0.47369868
-0.8693883238	1.602339684	3873/8176	0.47370352
-0.8645414262	1.599266261	15515/32752	0.47371153
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-0.8625472117	1.600156725	2587/5461	0.47372276
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-0.8621021687	1.59882196	3877/8184	0.47372923
-0.8617861906	1.599294297	4851/10240	0.47373047
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-0.8598605142	1.599215787	15523/32767	0.47373882
-0.8600486941	1.598832664	2183/4608	0.47374132
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-0.8596327343	1.598135479	15463/32640	0.47374387
-0.8619692635	1.596678857	15403/32512	0.47376353
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-0.8551867792	1.592994347	15517/32752	0.47377259
-0.8554876045	1.595362371	1933/4080	0.47377451
-0.8561349483	1.596483922	15521/32760	0.473779
-0.8561775852	1.597488447	15523/32764	0.4737822
-0.8551183649	1.598920534	235/496	0.47379032
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-0.8562553213	1.599094798	15495/32704	0.47379525
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-0.8568154793	1.599376153	15525/32767	0.47379986
-0.8566177699	1.599899967	7759/16376	0.47380313
-0.8569153254	1.600294204	1031/2176	0.47380515
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-0.8546695031	1.600961806	15405/32512	0.47382505
-0.8548257452	1.601264984	1937/4088	0.47382583
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-0.8545890039	1.602401027	15519/32752	0.47383366
-0.85480042	1.602433471	3821/8064	0.47383433
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-0.8550407616	1.602615103	11645/24576	0.47383626
-0.8550767254	1.603207683	15523/32760	0.47384005
-0.8547055783	1.603837776	15525/32764	0.47384324
-0.8543814075	1.603453732	7763/16383	0.47384484
-0.8538680203	1.603081204	1939/4092	0.47385142
-0.8535867069	1.60336316	7521/15872	0.47385333
-0.8532786192	1.603367438	7703/16256	0.47385581
-0.8532345351	1.603464259	15497/32704	0.47385641
-0.8524169949	1.603320858	14557/30720	0.47386068
-0.8525862089	1.603360522	15527/32767	0.4738609
-0.852753664	1.601692529	7279/15360	0.47389323
-0.8522229237	1.600736214	15521/32752	0.47389472
-0.8514308225	1.600752339	7643/16128	0.47389633
-0.8513579984	1.601487858	1289/2720	0.47389706
-0.8505513403	1.60247304	15527/32764	0.47390429
-0.8500357193	1.603879838	3761/7936	0.47391633
-0.8502552308	1.603670354	963/2032	0.47391732
-0.850236416	1.603567798	15499/32704	0.47391756
-0.850195703	1.603573618	11647/24576	0.47391764
-0.8507347378	1.603861456	15529/32767	0.47392193
-0.8507043471	1.604239234	7761/16376	0.47392526
-0.8508330168	1.60423815	4853/10240	0.47392578
-0.8510502982	1.604424182	15287/32256	0.47392733
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-0.8508557039	1.606018245	15409/32512	0.47394808
-0.8508200304	1.606010877	3875/8176	0.47394814
-0.8516929191	1.606138844	15523/32752	0.47395579
-0.8517387902	1.605810533	91/192	0.47395833
-0.852398368	1.605484214	15529/32764	0.47396533
-0.8524229557	1.605824586	7765/16383	0.47396692
-0.8525052324	1.606319011	1293/2728	0.47397361
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-0.8531855309	1.606382076	7705/16256	0.47397884
-0.8532279656	1.606203321	7523/15872	0.47397933
-0.8537190452	1.607027953	501/1057	0.47398297
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-0.8532950957	1.60784819	5157/10880	0.47398897
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-0.8507462934	1.607913367	675/1424	0.47401685
-0.8511760905	1.608331529	967/2040	0.47401961
-0.8513115727	1.60839966	7645/16128	0.47402034
-0.8513200022	1.608833257	15529/32760	0.4740232
-0.8514134623	1.608871808	2427/5120	0.47402344
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-0.8521038895	1.610186215	1881/3968	0.47404234
-0.8522149308	1.610921454	2219/4681	0.47404401
-0.8518454496	1.611429336	7763/16376	0.47404739
-0.8527331748	1.61205934	15473/32640	0.47405025
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-0.8498697325	1.612476808	14563/30720	0.47405599
-0.8503450952	1.61219063	3883/8191	0.47405689
-0.8503224462	1.611567282	5173/10912	0.47406525
-0.8494476904	1.611320526	969/2044	0.47407045
-0.8485344086	1.611640991	15049/31744	0.47407384
-0.8481564705	1.611051797	15527/32752	0.47407792
-0.8477118709	1.61158025	11651/24576	0.4740804
-0.8478963792	1.611780347	2579/5440	0.47408088
-0.8470294837	1.612567645	3823/8064	0.47408234
-0.8468522767	1.611604275	5177/10920	0.47408425
-0.8459101746	1.610805047	15533/32764	0.47408741
-0.8464354799	1.610075344	3641/7680	0.47408854
-0.8466162103	1.610377949	2589/5461	0.47408899
-0.8474895301	1.609303566	485/1023	0.4740958
-0.847720329	1.608563617	15535/32764	0.47414846
-0.8483854329	1.608517693	7283/15360	0.47415365
-0.8484676257	1.607474898	2587/5456	0.47415689
-0.8474461402	1.607450777	11653/24576	0.47416178
-0.8474751794	1.607508915	15507/32704	0.47416218
-0.847322491	1.607587369	1927/4064	0.47416339
-0.846893749	1.607480699	15537/32767	0.47416608
-0.8469352971	1.607291303	3763/7936	0.47416835
-0.8467311584	1.60719996	7765/16376	0.47416952
-0.8461989859	1.607419856	5159/10880	0.47417279
-0.846048019	1.607106451	2185/4608	0.47417535
-0.8460072487	1.607041937	863/1820	0.47417582
-0.846320549	1.60590595	15523/32736	0.47418744
-0.8452225134	1.605561835	3877/8176	0.47419276
-0.8448359166	1.605790787	15417/32512	0.47419414
-0.8440252691	1.606684719	15053/31744	0.47419985
-0.8440863002	1.60657543	15531/32752	0.47420005
-0.8444975357	1.606879544	5827/12288	0.47420247
-0.8446587777	1.606907612	7739/16320	0.47420343
-0.8446159955	1.607865303	15537/32764	0.4742095
-0.8441854325	1.607771188	7769/16383	0.47421107
-0.8436201033	1.607832083	3881/8184	0.47421799
-0.8435688308	1.608038844	607/1280	0.47421875
-0.8435564613	1.608657269	15509/32704	0.47422334
-0.8434608977	1.609146149	7709/16256	0.4742249
-0.8428222035	1.609077596	15539/32767	0.47422712
-0.8425813889	1.608789875	3883/8188	0.47423058
-0.8423109332	1.608831689	7527/15872	0.47423135
-0.8416705887	1.608914306	15479/32640	0.47423407
-0.8421877794	1.607603409	14569/30720	0.4742513
-0.8414373236	1.607287164	7755/16352	0.47425391
-0.8409398213	1.607192414	15419/32512	0.47425566
-0.8403594227	1.607902822	129/272	0.47426471
-0.8401096901	1.608324438	5179/10920	0.4742674
-0.8401995256	1.608622395	7649/16128	0.47426835
-0.8401184292	1.608915068	15539/32764	0.47427054
-0.8393332768	1.609477184	7763/16368	0.47427908
-0.8400104094	1.609938735	1457/3072	0.47428385
-0.8400343654	1.609758726	15511/32704	0.47428449
-0.8404892685	1.609803308	3855/8128	0.47428642
-0.8405561628	1.61029072	15541/32767	0.47428816
-0.8410964734	1.610979392	941/1984	0.47429435
-0.8417755669	1.611231184	15481/32640	0.47429534
-0.8407559695	1.612097958	7769/16380	0.47429792
-0.840287829	1.613276072	15299/32256	0.47429936
-0.8394705793	1.611930242	3885/8191	0.47430106
-0.8381331849	1.611858177	277/584	0.47431507
-0.8376335187	1.612266023	4857/10240	0.47431641
-0.8377965445	1.612774723	15421/32512	0.47431718
-0.8362130922	1.61265516	15535/32752	0.47432218
-0.8362294495	1.613765127	11657/24576	0.47432454
-0.8369825139	1.614142558	15057/31744	0.47432586
-0.8373962421	1.614144275	7741/16320	0.47432598
-0.8354906388	1.615090642	15539/32760	0.47432845
-0.8326008103	1.61574312	15541/32764	0.47433158
-0.8332807482	1.613677914	7771/16383	0.47433315
-0.8334048988	1.612277505	647/1364	0.47434018
-0.8312095787	1.610830582	15513/32704	0.47434565
-0.8328002654	1.607653793	7711/16256	0.47434793
-0.8336712226	1.608400441	3643/7680	0.47434896
-0.8334460753	1.608692487	15543/32767	0.47434919
-0.8347784142	1.608969995	971/2047	0.47435271
-0.835415765	1.608549081	15423/32512	0.47437869
-0.8358328306	1.609314735	14573/30720	0.47438151
-0.8358777938	1.607832773	3871/8160	0.47438725
-0.8362204985	1.607629063	15059/31744	0.47438886
-0.8361628365	1.607464713	15541/32760	0.4743895
-0.8360307264	1.606934079	1093/2304	0.47439236
-0.8360417428	1.6068721	15543/32764	0.47439263
-0.8366962651	1.606004089	7765/16368	0.47440127
-0.835755687	1.605782926	11659/24576	0.47440592
-0.8357536227	1.606058692	15515/32704	0.4744068
-0.8350512133	1.606113662	241/508	0.47440945
-0.835045589	1.605749254	15545/32767	0.47441023
-0.8348542897	1.605388438	7769/16376	0.47441378
-0.834736145	1.605330273	2429/5120	0.47441406
-0.8334924703	1.604913658	3097/6528	0.47441789
-0.8340004149	1.604627136	7771/16380	0.47442002
-0.8339883654	1.604440598	3765/7936	0.47442036
-0.8350827564	1.603650398	167/352	0.47443182
-0.8338998131	1.602640895	15425/32512	0.47444021
-0.8336060235	1.602155068	15539/32752	0.47444431
-0.8332088838	1.602554267	2915/6144	0.47444661
-0.832975289	1.603194187	2581/5440	0.47444853
-0.8325098325	1.602896289	1727/3640	0.47445055
-0.8322098405	1.603351201	15061/31744	0.47445186
-0.8311345687	1.602876102	15545/32764	0.47445367
-0.8302349956	1.602204399	1913/4032	0.47445437
-0.8316631734	1.601777297	2591/5461	0.47445523
-0.8318335741	1.600530952	353/744	0.47446237
-0.8296499211	1.59805304	15517/32704	0.47446795
-0.8327930652	1.596641388	7713/16256	0.47447096
-0.8321509752	1.597051335	2221/4681	0.47447127
-0.8330820171	1.597417403	3885/8188	0.47447484
-0.835130705	1.598042754	911/1920	0.47447917
-0.8346943762	1.598838998	1943/4095	0.47448107
-0.8355278255	1.599924276	7759/16352	0.47449853
-0.836229616	1.600389985	15427/32512	0.47450172
-0.8366756448	1.600891836	15541/32752	0.47450537
-0.8382847592	1.599163871	121/255	0.4745098
-0.8395357189	1.597864882	15525/32704	0.47471257
-0.8403288459	1.598094097	15555/32767	0.47471541
-0.840265556	1.598197137	7717/16256	0.47471703
-0.8406222519	1.598492072	169/356	0.4747191
-0.8415321862	1.598752672	1033/2176	0.47472426
-0.8412341992	1.600130871	1823/3840	0.47473958
-0.8424395893	1.600424902	1109/2336	0.47474315
-0.8432138415	1.600841185	15435/32512	0.47474779
-0.8446974505	1.600183504	15549/32752	0.47474963
-0.8437645816	1.598784132	1937/4080	0.4747549
-0.8435989578	1.598346513	15553/32760	0.4747558
-0.8432540216	1.5976907	15555/32764	0.47475888
-0.8445128188	1.597202444	7657/16128	0.47476438
-0.8434424147	1.596360425	15071/31744	0.47476689
-0.8433813957	1.596528783	7771/16368	0.47476784
-0.842716282	1.596760003	2917/6144	0.47477214
-0.84261281	1.596893053	15527/32704	0.47477373
-0.8422588467	1.596630809	3859/8128	0.47477854
-0.8420012917	1.596444201	7775/16376	0.47478017
-0.8414129148	1.5960492	15497/32640	0.47478554
-0.8414643078	1.595853928	1111/2340	0.47478632
-0.8424654558	1.595389765	471/992	0.47479839
-0.8421409615	1.594606254	2431/5120	0.47480469
-0.842131518	1.593984315	15437/32512	0.4748093
-0.8418588557	1.59390561	15551/32752	0.4748107
-0.8415368153	1.594019497	11669/24576	0.47481283
-0.8411835197	1.593876175	2583/5440	0.47481618
-0.8410418194	1.593766394	1037/2184	0.47481685
-0.8408101248	1.593127183	15557/32764	0.47481992
-0.8412789187	1.593126065	2593/5461	0.47482146
-0.8416771554	1.593111103	547/1152	0.47482639
-0.8417586948	1.592545074	15073/31744	0.47482989
-0.8418520282	1.591913701	15529/32704	0.47483488
-0.8425530904	1.591582403	14587/30720	0.47483724
-0.8423969598	1.591715881	15559/32767	0.47483749
-0.8425607297	1.592138908	7719/16256	0.47484006
-0.8437570266	1.593026383	3647/7680	0.47486979
-0.8448820133	1.593318726	15553/32752	0.47487176
-0.8454155836	1.59173804	775/1632	0.47487745
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-0.8452466372	1.59046296	15559/32764	0.47488097
-0.8459733762	1.588068489	2591/5456	0.47489003
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-0.8391968079	1.590345997	3887/8184	0.47495112
-0.8391772291	1.590982853	15077/31744	0.4749559
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-0.836270554	1.588815534	19/40	0.475
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-0.8352443786	1.583271351	15539/32704	0.47514066
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-0.8353206923	1.582699289	15083/31744	0.47514491
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-0.8342399164	1.581630287	15509/32640	0.47515319
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-0.8349018753	1.579797078	5185/10912	0.47516496
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-0.8323342845	1.580885775	15563/32752	0.47517709
-0.8323650824	1.581228618	15449/32512	0.4751784
-0.8326126553	1.581789249	5189/10920	0.47518315
-0.8325442994	1.58197404	517/1088	0.47518382
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-0.8319531697	1.582031185	2595/5461	0.47518769
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-0.8308841565	1.582519301	479/1008	0.47519841
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-0.8303657668	1.582984984	15571/32767	0.47520371
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-0.8299481382	1.582722322	15085/31744	0.47520791
-0.8297845267	1.58262972	7725/16256	0.47520915
-0.8295532257	1.581494139	15557/32736	0.47522605
-0.8299320585	1.581390654	14599/30720	0.47522786
-0.8296229786	1.5804289	15329/32256	0.47522941
-0.8287191014	1.581049819	7771/16352	0.47523239
-0.8277314201	1.581091452	15565/32752	0.47523815
-0.8276349257	1.581634065	7543/15872	0.47523942
-0.8280331554	1.582208182	15569/32760	0.4752442
-0.8281159232	1.582426904	1939/4080	0.4752451
-0.8279882285	1.582740623	15571/32764	0.47524722
-0.8275872871	1.583355402	2593/5456	0.4752566
-0.8279539183	1.583567517	365/768	0.47526042
-0.8283664627	1.583443819	15543/32704	0.47526296
-0.8284066098	1.583833444	15573/32767	0.47526475
-0.8287409878	1.584455923	3863/8128	0.47527067
-0.8288282071	1.584347364	15087/31744	0.47527092
-0.8285949853	1.585273556	173/364	0.47527473
-0.8284412485	1.585511213	5171/10880	0.47527574
-0.8277630685	1.585101384	3893/8191	0.47527774
-0.8270912423	1.584918072	15559/32736	0.47528715
-0.8267089787	1.585296805	15331/32256	0.47529142
-0.8266408214	1.585718154	4867/10240	0.47529297
-0.8267973178	1.585864634	1943/4088	0.47529354
-0.8260246541	1.58667462	15567/32752	0.47529922
-0.826319211	1.587102694	11681/24576	0.47530111
-0.8263989647	1.586936055	15453/32512	0.47530143
-0.8268651078	1.587037939	943/1984	0.47530242
-0.8265965555	1.588342295	15571/32760	0.47530525
-0.827061127	1.588822592	7757/16320	0.47530637
-0.8253017163	1.589940194	15573/32764	0.47530827
-0.8247273614	1.588496188	7787/16383	0.47530977
-0.8209471136	1.587824745	3833/8064	0.47532242
-0.8194809597	1.586164881	15545/32704	0.47532412
-0.8218034451	1.584903613	7301/15360	0.47532552
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-0.8231563235	1.58442066	973/2047	0.47532975
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-0.8240139573	1.582756214	15455/32512	0.47536294
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-0.8236240092	1.5822003	5191/10920	0.4753663
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-0.8232557217	1.581620793	15575/32764	0.47536931
-0.8231023788	1.580480683	251/528	0.47537879
-0.822335918	1.580619103	11683/24576	0.47538249
-0.8221193777	1.581027486	7667/16128	0.47538442
-0.8221204786	1.581518826	2221/4672	0.47538527
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-0.8197951642	1.581641682	483/1016	0.4753937
-0.8191175558	1.580580734	599/1260	0.47539683
-0.81860373	1.579949601	15517/32640	0.47539828
-0.8194554151	1.578094604	15563/32736	0.47540934
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-0.8178640857	1.578660007	3887/8176	0.47541585
-0.8165649019	1.578366354	677/1424	0.47542135
-0.8163899022	1.578911392	2921/6144	0.47542318
-0.8159875824	1.580345418	445/936	0.47542735
-0.8160199657	1.580912501	3773/7936	0.47542843
-0.8163230438	1.581888648	7759/16320	0.47542892
-0.8140022506	1.581822894	15577/32764	0.47543035
-0.8136481209	1.579635706	7789/16383	0.47543185
-0.8111500426	1.578337966	1297/2728	0.47543988
-0.8082958817	1.571685275	15579/32767	0.47544786
-0.8108955305	1.570033795	3893/8188	0.47545188
-0.8155334048	1.569996069	7729/16256	0.47545522
-0.8147743332	1.570969852	7303/15360	0.47545573
-0.8148494541	1.572633905	649/1365	0.47545788
-0.8159710628	1.573423381	1415/2976	0.47547043
-0.8172944758	1.57302232	7775/16352	0.47547701
-0.8174246071	1.573284156	2191/4608	0.47547743
-0.8183936445	1.57304594	15573/32752	0.47548241
-0.817783809	1.572013004	15459/32512	0.47548597
-0.8184345466	1.571453579	4869/10240	0.47548828
-0.8182712038	1.571328798	15577/32760	0.4754884
-0.8184526042	1.570152007	97/204	0.4754902
-0.8189573822	1.570432014	15579/32764	0.47549139
-0.8189911303	1.570475538	7547/15872	0.47549143
-0.820258168	1.570087426	7783/16368	0.47550098
-0.8204202099	1.569455821	5843/12288	0.47550456
-0.8189191675	1.567501643	15551/32704	0.47550758
-0.8202920428	1.566944139	7669/16128	0.47550843
-0.8208195116	1.568118284	15581/32767	0.4755089
-0.8222226364	1.567611395	7787/16376	0.47551295
-0.8247625335	1.568265735	3865/8128	0.47551673
-0.8244410276	1.568827387	7789/16380	0.47551893
-0.8240760179	1.570021529	913/1920	0.47552083
-0.8233685668	1.569896324	3895/8191	0.47552191
-0.8228280965	1.570981152	5189/10912	0.47553152
-0.8246282946	1.572715565	243/511	0.47553816
-0.8257974425	1.573414106	7789/16376	0.47563508
-0.8263174827	1.573934134	1933/4064	0.47563976
-0.8263946273	1.574224391	371/780	0.47564103
-0.8263939611	1.574622563	1035/2176	0.47564338
-0.825478097	1.574965985	3653/7680	0.47565104
-0.8261091586	1.576012241	15571/32736	0.47565371
-0.8281939082	1.575731599	15343/32256	0.47566344
-0.8279336143	1.574848775	15579/32752	0.47566561
-0.8277738359	1.574665295	5845/12288	0.47566732
-0.827698896	1.574390326	15465/32512	0.47567052
-0.8276286039	1.574133517	15583/32760	0.47567155
-0.8276941163	1.57377952	7763/16320	0.47567402
-0.8278311419	1.573673636	15585/32764	0.47567452
-0.8281348352	1.573884266	7793/16383	0.47567601
-0.8283799084	1.57409754	3775/7936	0.47568044
-0.8286453107	1.573663188	4871/10240	0.47568359
-0.8286327416	1.57351108	3893/8184	0.47568426
-0.8288777487	1.572512281	15557/32704	0.47569105
-0.8290930669	1.572757998	15587/32767	0.47569201
-0.8292223783	1.572947866	137/288	0.47569444
-0.8294809069	1.57280755	3895/8188	0.47569614
-0.8299031938	1.573036954	7733/16256	0.47570128
-0.8302703628	1.573887613	5191/10912	0.47571481
-0.8299684376	1.573982495	7307/15360	0.47571615
-0.831415251	1.573915168	7779/16352	0.47572162
-0.8323535777	1.573355583	15581/32752	0.47572667
-0.8314008823	1.572352051	1039/2184	0.4757326
-0.831157294	1.571833759	15587/32764	0.47573556
-0.8312802705	1.570792021	7551/15872	0.47574345
-0.8309718506	1.571073418	7787/16368	0.47574536
-0.8306721704	1.571168141	2923/6144	0.4757487
-0.8302294393	1.571484071	15559/32704	0.4757522
-0.8301846963	1.571232521	2227/4681	0.47575304
-0.8300573751	1.570952985	7673/16128	0.47575645
-0.8298253155	1.570986558	7791/16376	0.47575721
-0.8292836926	1.570293167	7793/16380	0.47576313
-0.8296976397	1.570015575	15529/32640	0.47576593
-0.8298992493	1.570047682	3897/8191	0.47576608
-0.830429126	1.569926621	15103/31744	0.47577495
-0.8304636816	1.56968115	15575/32736	0.4757759
-0.8301578433	1.569117025	609/1280	0.47578125
-0.8299331332	1.568870216	1945/4088	0.47578278
-0.8299519342	1.568372133	15347/32256	0.47578745
-0.8298706281	1.568358818	15583/32752	0.47578774
-0.8296665411	1.568345028	11693/24576	0.47578939
-0.8290652213	1.56788256	15469/32512	0.47579355
-0.8290471405	1.567769995	1199/2520	0.47579365
-0.8293588653	1.566880271	1553/3264	0.47579657
-0.8293920427	1.566920236	15589/32764	0.47579661
-0.8297804123	1.567309177	7795/16383	0.47579808
-0.8304835697	1.567024281	59/124	0.47580645
-0.831445017	1.566534888	2223/4672	0.47581336
-0.8314647943	1.566773724	14617/30720	0.4758138
-0.8313005482	1.566785454	15591/32767	0.47581408
-0.8322749761	1.567992885	7781/16352	0.47584393
-0.8327626913	1.568350598	15585/32752	0.4758488
-0.8330719479	1.568587987	15349/32256	0.47584945
-0.8331501442	1.567516585	2227/4680	0.4758547
-0.8332600828	1.567478733	15471/32512	0.47585507
-0.8333991507	1.567134331	15591/32764	0.47585765
-0.833457919	1.567165545	3883/8160	0.47585784
-0.8338665646	1.566408661	7789/16368	0.47586755
-0.8336749824	1.566037092	7553/15872	0.47586946
-0.8335369825	1.566303573	11695/24576	0.47587077
-0.8329094464	1.566219906	15563/32704	0.47587451
-0.8330467013	1.566079687	503/1057	0.47587512
-0.8329296703	1.565739982	4873/10240	0.47587891
-0.8327995245	1.565694956	7793/16376	0.47587934
-0.8327054391	1.565575683	7675/16128	0.47588046
-0.8325184091	1.565102433	1559/3276	0.47588523
-0.8325439368	1.565019834	967/2032	0.47588583
-0.8332815228	1.564192053	5193/10912	0.47589809
-0.8329193297	1.563864124	15107/31744	0.47590096
-0.8323164171	1.564089343	3891/8176	0.47590509
-0.8319791767	1.56402371	15587/32752	0.47590987
-0.8319490875	1.56415205	731/1536	0.47591146
-0.8315875844	1.564525288	5197/10920	0.47591575
-0.8315369757	1.564614658	15473/32512	0.47591658
-0.8310347151	1.564563821	15593/32764	0.47591869
-0.8309527834	1.564541023	2589/5440	0.47591912
-0.8311423397	1.564147156	2599/5461	0.47592016
-0.8304201931	1.563582394	3895/8184	0.47592864
-0.8300453698	1.563788536	3777/7936	0.47593246
-0.8280371068	1.562582154	15565/32704	0.47593567
-0.8291441231	1.562693429	15595/32767	0.47593616
-0.8296178482	1.561625312	3897/8188	0.4759404
-0.8308532873	1.560963125	14621/30720	0.47594401
-0.83123016	1.561739928	1949/4095	0.47594628
-0.8318253282	1.562168522	15581/32736	0.47595919
-0.8323112349	1.562049526	15109/31744	0.47596396
-0.8327555454	1.561615113	7783/16352	0.47596624
-0.8332144958	1.561303803	15589/32752	0.47597093
-0.8328496831	1.56103839	15353/32256	0.47597346
-0.8328760219	1.560360368	2437/5120	0.47597656
-0.8327681187	1.56021232	15593/32760	0.4759768
-0.8324148921	1.559912037	15475/32512	0.4759781
-0.8329770213	1.559487644	15595/32764	0.47597973
-0.833147127	1.559234725	971/2040	0.47598039
-0.833757589	1.558476688	2597/5456	0.47598974
-0.8335017635	1.558188875	5849/12288	0.47599284
-0.8325992817	1.558108648	7555/15872	0.47599546
-0.8323753963	1.556121741	15567/32704	0.47599682
-0.8330549486	1.557050212	15597/32767	0.47599719
-0.8340418944	1.555583564	7795/16376	0.47600147
-0.8366202797	1.555583865	2599/5460	0.47600733
-0.837297836	1.556883308	3869/8128	0.47600886
-0.8368394691	1.556735709	14623/30720	0.47600911
-0.8360621243	1.556947148	3899/8191	0.47601026
-0.8361919053	1.55832626	15583/32736	0.47602028
-0.8376196653	1.558404807	15111/31744	0.47602697
-0.8381506012	1.558992998	15591/32752	0.476032
-0.8383202883	1.558845331	11699/24576	0.47603353
-0.8393980189	1.558282201	15355/32256	0.47603547
-0.839334772	1.560593914	15597/32764	0.47604078
-0.838778148	1.560692111	457/960	0.47604167
-0.8387157787	1.560294389	7799/16383	0.47604224
-0.8372853477	1.561436175	487/1023	0.47605083
-0.8367887525	1.562195496	1733/3640	0.4760989
-0.8367099354	1.562504367	15479/32512	0.47610113
-0.8365389696	1.562604994	15599/32764	0.47610182
-0.8363819387	1.562667025	259/544	0.47610294
-0.8360908557	1.562221568	7313/15360	0.47610677
-0.8362326818	1.563370331	7793/16368	0.47611193
-0.8365240494	1.563381473	11701/24576	0.47611491
-0.8370945882	1.563435115	15571/32704	0.47611913
-0.8368964336	1.563656358	7557/15872	0.47612147
-0.8373147935	1.563801547	339/712	0.4761236
-0.8376587966	1.564055021	1097/2304	0.47612847
-0.8377562856	1.56424233	7799/16380	0.47612943
-0.83766626	1.56448063	1935/4064	0.47613189
-0.8370713856	1.564549975	14627/30720	0.47613932
-0.837171471	1.565520091	1417/2976	0.47614247
-0.8385301433	1.56533819	3893/8176	0.47614971
-0.8391204417	1.565343027	15115/31744	0.47615297
-0.8389783976	1.565065181	15595/32752	0.47615413
-0.8388727914	1.56490814	5851/12288	0.4761556
-0.8390082021	1.564476238	15359/32256	0.47615947
-0.8390163222	1.564282553	15599/32760	0.47615995
-0.8393116276	1.563907398	15481/32512	0.47616265
-0.8394614058	1.563896118	15601/32764	0.47616286
-0.8396980263	1.564133071	7771/16320	0.47616422
-0.8396630765	1.564300155	7801/16383	0.47616432
-0.8404540416	1.56441293	1219/2560	0.47617188
-0.8408032324	1.56425471	1299/2728	0.47617302
-0.8420864835	1.563498343	15573/32704	0.47618028
-0.8419739802	1.563516913	2229/4681	0.4761803
-0.842668869	1.564096337	3899/8188	0.47618466
-0.8434081305	1.568870916	15613/32736	0.47693671
-0.8444630052	1.569411008	3785/7936	0.47694052
-0.8462249497	1.570019319	15621/32752	0.47694797
-0.846757349	1.568908917	1221/2560	0.47695312
-0.8468876215	1.568840729	3125/6552	0.4769536
-0.8474399484	1.568629692	15627/32764	0.47695642
-0.8475451571	1.569155097	973/2040	0.47696078
-0.8479818638	1.569383198	15507/32512	0.47696235
-0.848518281	1.568690612	7807/16368	0.47696725
-0.848389006	1.568305008	5861/12288	0.4769694
-0.8481012569	1.567871504	15141/31744	0.47697203
-0.8486692513	1.567716989	15629/32767	0.47697378
-0.8486997422	1.567825164	15599/32704	0.47697529
-0.8494124789	1.56771315	7811/16376	0.47697851
-0.8502754315	1.567997504	601/1260	0.47698413
-0.8503503095	1.568557518	14653/30720	0.47698568
-0.8499563372	1.568505294	3907/8191	0.47698694
-0.8497075776	1.568636887	3877/8128	0.47699311
-0.8497582153	1.569122605	1099/2304	0.47699653
-0.8495678428	1.569226627	5205/10912	0.4769978
-0.8506436982	1.569507174	7571/15872	0.47700353
-0.8504412816	1.56976063	975/2044	0.47700587
-0.850973721	1.56998607	15623/32752	0.47700904
-0.8511014241	1.56976074	11723/24576	0.47701009
-0.851844046	1.570018069	5209/10920	0.47701465
-0.8521278988	1.570655554	15629/32764	0.47701746
-0.8517991135	1.57101499	7327/15360	0.47701823
-0.851646175	1.570718361	2605/5461	0.47701886
-0.8514065781	1.570544124	519/1088	0.47702206
-0.85103471	1.570830664	15509/32512	0.47702387
-0.8510066933	1.572065601	5129/10752	0.47702753
-0.8496416147	1.572586219	15629/32760	0.4770757
-0.8494070305	1.573299166	15631/32764	0.4770785
-0.8487735567	1.572745563	229/480	0.47708333
-0.8476396956	1.572891553	15511/32512	0.47708538
-0.8483417666	1.57502104	2603/5456	0.47708944
-0.8482329879	1.575581168	15389/32256	0.47708953
-0.8494681251	1.574858986	11725/24576	0.47709147
-0.8504858622	1.574962633	15633/32767	0.47709586
-0.8501901781	1.575028861	2229/4672	0.4770976
-0.8503508836	1.575324403	15145/31744	0.47709803
-0.8511814414	1.575619857	7813/16376	0.47710064
-0.852455385	1.575947574	521/1092	0.47710623
-0.8514274679	1.577236313	14657/30720	0.47711589
-0.8508441892	1.577128571	1939/4064	0.47711614
-0.8518147648	1.579938307	15619/32736	0.47711999
-0.8571539544	1.577638979	3901/8176	0.47712818
-0.85650872	1.575116939	7573/15872	0.47712954
-0.8560472761	1.574901787	15627/32752	0.47713117
-0.8554030752	1.575199224	5863/12288	0.47713216
-0.8547227972	1.574238261	2233/4680	0.47713675
-0.8545730807	1.573426321	15633/32764	0.47713954
-0.8551595613	1.573410418	7817/16383	0.47714094
-0.8556100193	1.573885742	7787/16320	0.47714461
-0.8563633894	1.572911684	15513/32512	0.4771469
-0.8557440792	1.572476478	2443/5120	0.47714844
-0.8560514419	1.572077121	355/744	0.47715054
-0.8556394298	1.571683704	15391/32256	0.47715154
-0.8554932638	1.570732065	15635/32767	0.4771569
-0.8556192904	1.571003591	15605/32704	0.47715876
-0.8560613027	1.570380459	15147/31744	0.47716104
-0.8562331173	1.570528014	3907/8188	0.4771617
-0.8597007087	1.571251524	481/1008	0.47718254
-0.8604578915	1.568572717	7803/16352	0.47718933
-0.8579409669	1.567902254	3787/7936	0.47719254
diff --git a/sandbox/wittner/buff.png b/sandbox/wittner/buff.png
deleted file mode 100644
index 008b091..0000000
Binary files a/sandbox/wittner/buff.png and /dev/null differ
diff --git a/sandbox/wittner/hubbard.g b/sandbox/wittner/hubbard.g
deleted file mode 100755
index 97e5a8f..0000000
--- a/sandbox/wittner/hubbard.g
+++ /dev/null
@@ -1,1581 +0,0 @@
-#!/bin/sh
-cat > /tmp/procgroup.$$ <<EOF
-local 0
-gauss00 1 /home/laurent/.../bin64/pargap
-gauss00 1 /home/laurent/.../bin64/pargap
-gauss01 1 /home/laurent/.../bin64/pargap
-gauss01 1 /home/laurent/.../bin64/pargap
-gauss02 1 /home/laurent/.../bin64/pargap
-gauss02 1 /home/laurent/.../bin64/pargap
-gauss03 1 /home/laurent/.../bin64/pargap
-gauss03 1 /home/laurent/.../bin64/pargap
-gauss04 1 /home/laurent/.../bin64/pargap
-gauss04 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-gauss08 1 /home/laurent/.../bin64/pargap
-EOF
-start=`grep -n '#G[A]P' $0 | sed 's/:.*$//g'`
-tail -n +$start $0 | pargap -r -q -p4pg /tmp/procgroup.$$ > log.$$ 2>&1
-exit
-#GAP
-################################################################
-# Compute images, in parameter space, of Misiurewicz points,
-# or of matings of Misiurewicz polynomials with rabbit/corabbit/airplane
-#
-mindenom := 8; # minimal denominator; all i/mindenom will be computed
-maxdenom := 2^14; # maximal denominator
-mindist := 1/10; # subdivide as long as denominator is small enough and
-                 # distance between neighbouring points is >mindist
-
-type := "rabbit";
-
-maxpcset := 15; # maximal number of post-critical points
-################################################################
-
-#ParReset();
-ParEval("LoadPackage(\"fr\")");
-#ParEval("SetInfoLevel(InfoFR,2)");
-ParEval("EPS@fr.maxratio := MacFloat(16/10)");
-ParEval("EPS@fr.fast := MacFloat(5)");
-
-################################################################
-ParInstallTOPCGlobalFunction("makemeone", function(mindenom,maxdenom,mindist,maxpcset,type)
-    local points, i, j, idle, c2i, i2c, obstructed, task, angle2, job, isreal;
-    
-    c2i := function(c)
-        if IsInt(c) then return c; fi;
-        return [Int(10^10*RealPart(c)),Int(10^10*ImaginaryPart(c))];
-    end;
-    i2c := function(i)
-        if IsInt(i) then return i; fi;
-        return Complex(i[1]/10^10,i[2]/10^10);
-    end;
-
-    isreal := function(angle)
-        local a, b, seen, a0, a1;
-    
-	a := angle;
-	b := 1-angle; if b=1 then b := 0; fi;
-	a0 := angle/2;
-	a1 := (angle+1)/2;
-	seen := [];
-    
-	repeat
-            Add(seen,a);
-            if not ((a0<=a and a1>=a and a0<=b and a1>=b) or
-                ((a0>a or a1<a) and (a0>b or a1<b))) then
-	        return false;
-            fi;
-            a := 2*a;
-            if a>1 then a := a-1; fi;
-            b := 2*b;
-            if b>1 then b := b-1; fi;
-	until a in seen;
-	return true;
-    end;
-
-    MakeReadWriteGlobal("ErrorInner");
-    ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-    if type="mandelbrot" then
-	task := function(angle)
-            local v;
-            v := CALL_WITH_CATCH(RationalFunction,[PolynomialIMGMachine(2,[angle],false)]:param_unicritical);
-	    if not v[1] then # gap error
-		return 1;
-	    elif IsRationalFunction(v[2]) then # z^2+c
-		return c2i(Value(v[2],0));
-	    elif IsRecord(v[2]) then # obstruction
-		return 0;
-	    else # fr error
-		return 1;
-	    fi;
-	end;
-    else # points in slice v3
-        if type="rabbit" then
-            angle2 := 1/7;
-        elif type="airplane" then
-            angle2 := 3/7;
-        elif type="corabbit" then
-            angle2 := 5/7;
-        fi;
-        obstructed := [1-angle2-1/7,1-angle2];
-        task := function(angle)
-            local v;
-	    if angle >= obstructed[1] and angle <= obstructed[2] then
-		return 0; # we know it's an obstruction
-	    fi;
-	    RUNTIME@fr := Runtime() + 3600*1000; # allow 1 hour
-            v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[angle2]))]:param_v:=3);
-	    Info(InfoFR,1,"Spider converged to ",v," on ",MPI_Comm_rank());
-            if not v[1] then
-                return 1; # gap error
-            elif IsRationalFunction(v[2]) then # 1 - (1+a)z^-1 + az^-2
-                return c2i(CoefficientsOfUnivariateLaurentPolynomial(v[2])[1][1]);
-            elif IsRecord(v[2]) then
-		return 0; # obstruction
-	    else
-                return 1; # fr error
-            fi;
-        end;
-    fi;
-
-    points := [];
-
-    job := [];
-    # classical job
-    for i in Combinations([0..maxpcset],2) do
-	j := 2^i[2]-2^i[1];
-	UniteSet(job,[0..j-1]/j);
-    od;
-
-    # Hamal Hubbard's question: only points in [2/7,1/3]
-    if false then
-	job := Filtered(job,angle->IsEvenInt(DenominatorRat(angle)) and angle >= 2/7 and angle <= 1/3);
-    fi;
-
-    # Xavier Buff's question: real polynomials with rabbit
-
-    if true then
-	job := Filtered(job,angle->angle<=1/2 and isreal(angle));
-
-    job := [ 1/3, 31/65, 14659/30720, 5207/10912, 15629/32752,
-  1737/3640, 15635/32764, 649/1360, 15515/32512, 7811/16368,
-  15637/32767, 15607/32704, 7815/16376, 15149/31744, 13683/28672,
-  7817/16380, 3909/8191, 3879/8128, 15623/32736, 7697/16128,
-  4887/10240, 1951/4088, 15631/32752, 11729/24576, 7575/15872,
-  3127/6552, 3421/7168, 15637/32764, 7819/16383, 7789/16320,
-  15517/32512, 21/44, 15395/32256, 7331/15360, 15639/32767,
-  15609/32704, 977/2047, 1283/2688, 14663/30720, 1115/2336,
-  15633/32752, 947/1984, 15637/32760, 15639/32764, 779/1632,
-  6843/14336, 15519/32512, 7813/16368, 11731/24576, 15397/32256,
-  15641/32767, 15611/32704, 611/1280, 7817/16376, 15153/31744,
-  1117/2340, 15581/32640, 485/1016, 5209/10912, 13687/28672,
-  7699/16128, 3903/8176, 15635/32752, 2933/6144, 401/840, 7577/15872,
-  15641/32764, 2607/5461, 2597/5440, 15521/32512, 3907/8184,
-  1711/3584, 15643/32767, 15613/32704, 3909/8188, 7333/15360, 391/819,
-  7761/16256, 15629/32736, 275/576, 7807/16352, 13689/28672,
-  15637/32752, 4889/10240, 15641/32760, 3789/7936, 15643/32764,
-  487/1020, 15523/32512, 2605/5456, 5867/12288, 15401/32256,
-  2235/4681, 15615/32704, 7819/16376, 6845/14336, 869/1820, 3667/7680,
-  3911/8191, 1039/2176, 3881/8128, 1421/2976, 2567/5376, 15649/32767,
-  5135/10752, 15619/32704, 7821/16376, 7823/16380, 917/1920,
-  1941/4064, 15635/32736, 6847/14336, 7703/16128, 3905/8176,
-  15643/32752, 5869/12288, 15647/32760, 15649/32764, 7825/16383,
-  7581/15872, 1559/3264, 4891/10240, 15529/32512, 1303/2728,
-  13695/28672, 15651/32767, 2201/4608, 15621/32704, 3911/8188,
-  7337/15360, 7765/16256, 15637/32736, 107/224, 15645/32752,
-  15649/32760, 15651/32764, 1949/4080, 3791/7936, 7819/16368,
-  15531/32512, 2935/6144, 15653/32767, 15623/32704, 15409/32256,
-  7823/16376, 13697/28672, 1565/3276, 3913/8191, 15593/32640,
-  15165/31744, 5213/10912, 3883/8128, 1223/2560, 279/584, 7705/16128,
-  15647/32752, 11741/24576, 1739/3640, 6849/14336, 15653/32764,
-  2609/5461, 2599/5440, 7583/15872, 1955/4092, 15533/32512,
-  14677/30720, 505/1057, 15625/32704, 5137/10752, 7339/15360,
-  7813/16352, 3853/8064, 15649/32752, 15653/32760, 15655/32764,
-  3425/7168, 3899/8160, 237/496, 15535/32512, 11743/24576,
-  15657/32767, 15627/32704, 4893/10240, 7825/16376, 15413/32256,
-  2609/5460, 5199/10880, 13701/28672, 15643/32736, 15169/31744,
-  971/2032, 3907/8176, 15651/32752, 367/768, 3131/6552, 15657/32764,
-  7829/16383, 7799/16320, 3911/8184, 15537/32512, 7585/15872,
-  6851/14336, 2237/4681, 15629/32704, 3913/8188, 15415/32256,
-  14681/30720, 1957/4095, 5215/10912, 7769/16256, 15171/31744,
-  13703/28672, 7815/16352, 15653/32752, 1927/4032, 2447/5120,
-  5219/10920, 15659/32764, 65/136, 7823/16368, 5873/12288,
-  15539/32512, 3793/7936, 15661/32767, 2233/4672, 7827/16376,
-  1713/3584, 7829/16380, 14683/30720, 3915/8191, 15601/32640,
-  15647/32736, 3885/8128, 15173/31744, 977/2044, 15655/32752,
-  11747/24576, 7709/16128, 2237/4680, 13705/28672, 15661/32764,
-  3671/7680, 7831/16383, 7801/16320, 163/341, 1285/2688, 15661/32760,
-  15663/32764, 7343/15360, 13707/28672, 3901/8160, 7825/16368,
-  11749/24576, 15543/32512, 15665/32767, 1897/3968, 15635/32704,
-  7829/16376, 2203/4608, 7831/16380, 14687/30720, 3121/6528,
-  3427/7168, 5217/10912, 1943/4064, 15177/31744, 3909/8176,
-  15659/32752, 5875/12288, 7711/16128, 5221/10920, 15665/32764,
-  2611/5461, 153/320, 3913/8184, 15545/32512, 13709/28672,
-  15667/32767, 15637/32704, 7589/15872, 3915/8188, 5141/10752,
-  15607/32640, 14689/30720, 1423/2976, 7773/16256, 6855/14336,
-  1117/2336, 15179/31744, 15661/32752, 241/504, 15667/32764,
-  1951/4080, 2609/5456, 1469/3072, 15547/32512, 15669/32767,
-  15639/32704, 7831/16376, 3795/7936, 13711/28672, 373/780,
-  15425/32256, 3917/8191, 5203/10880, 505/1056, 4897/10240, 3887/8128,
-  1955/4088, 681/1424, 11753/24576, 15181/31744, 15667/32760,
-  857/1792, 15669/32764, 7835/16383, 1561/3264, 1957/4092,
-  15549/32512, 3673/7680, 15671/32767, 15641/32704, 11/23, 7775/16256,
-  14693/30720, 7821/16352, 15665/32752, 15183/31744, 1741/3640,
-  551/1152, 15671/32764, 6857/14336, 1301/2720, 7829/16368,
-  11755/24576, 15551/32512, 2239/4681, 2449/5120, 15643/32704,
-  7833/16376, 949/1984, 1567/3276, 5143/10752, 15613/32640,
-  13715/28672, 15659/32736, 243/508, 3911/8176, 15667/32752,
-  2939/6144, 15671/32760, 15185/31744, 15673/32764, 7715/16128,
-  7837/16383, 7807/16320, 1305/2728, 3429/7168, 15553/32512,
-  15675/32767, 2235/4672, 3917/8188, 1837/3840, 653/1365, 1041/2176,
-  15661/32736, 7777/16256, 13717/28672, 7823/16352, 15669/32752,
-  4899/10240, 2239/4680, 15187/31744, 15675/32764, 643/1344,
-  15679/32760, 15681/32764, 7841/16383, 2573/5376, 15193/31744,
-  4901/10240, 7811/16320, 3917/8184, 13723/28672, 15683/32767,
-  15561/32512, 15653/32704, 3919/8188, 919/1920, 5223/10912,
-  7781/16256, 3431/7168, 7827/16352, 15677/32752, 5227/10920,
-  15683/32764, 965/2016, 15195/31744, 651/1360, 7835/16368, 2941/6144,
-  15685/32767, 15563/32512, 15655/32704, 7839/16376, 13725/28672,
-  7841/16380, 3921/8191, 5147/10752, 3799/7936, 3125/6528,
-  15671/32736, 2451/5120, 3891/8128, 1957/4088, 15679/32752,
-  11765/24576, 15683/32760, 6863/14336, 15685/32764, 7843/16383,
-  1103/2304, 15197/31744, 7813/16320, 653/1364, 14707/30720,
-  2241/4681, 15565/32512, 15657/32704, 3677/7680, 7783/16256,
-  7829/16352, 15681/32752, 3137/6552, 15687/32764, 429/896, 3907/8160,
-  15199/31744, 7837/16368, 11767/24576, 15689/32767, 15567/32512,
-  4903/10240, 2237/4672, 7841/16376, 7843/16380, 15445/32256,
-  13729/28672, 15629/32640, 475/992, 973/2032, 3915/8176, 15683/32752,
-  1471/3072, 249/520, 15689/32764, 2615/5461, 7723/16128, 521/1088,
-  3919/8184, 15201/31744, 6865/14336, 15691/32767, 15569/32512,
-  15661/32704, 3921/8188, 14711/30720, 1961/4095, 5149/10752,
-  15631/32640, 15677/32736, 7601/15872, 13731/28672, 7785/16256,
-  7831/16352, 15685/32752, 613/1280, 15689/32760, 15691/32764,
-  1931/4032, 977/2040, 2613/5456, 5885/12288, 15203/31744,
-  15693/32767, 15571/32512, 15663/32704, 341/712, 3433/7168, 523/1092,
-  14713/30720, 3923/8191, 2207/4608, 5211/10880, 15679/32736,
-  3801/7936, 3893/8128, 979/2044, 15687/32752, 11771/24576, 1207/2520,
-  13733/28672, 15693/32764, 7357/15360, 7847/16383, 2575/5376,
-  7817/16320, 5231/10920, 15695/32764, 3679/7680, 13735/28672,
-  3863/8064, 1303/2720, 7841/16368, 11773/24576, 15697/32767,
-  15207/31744, 15575/32512, 15667/32704, 7845/16376, 1121/2340,
-  14717/30720, 1717/3584, 15637/32640, 15683/32736, 1901/3968,
-  1947/4064, 3917/8176, 15691/32752, 5887/12288, 3139/6552,
-  15697/32764, 7849/16383, 2453/5120, 7727/16128, 7819/16320,
-  1307/2728, 13737/28672, 15699/32767, 15209/31744, 15577/32512,
-  15669/32704, 3923/8188, 14719/30720, 15455/32256, 5213/10880,
-  15685/32736, 6869/14336, 7605/15872, 7789/16256, 7835/16352,
-  15693/32752, 15697/32760, 15699/32764, 23/48, 2243/4681, 7847/16376,
-  15671/32704, 15579/32512, 15211/31744, 13739/28672, 7849/16380,
-  3925/8191, 5229/10912, 15641/32640, 15457/32256, 4907/10240,
-  11777/24576, 15695/32752, 1959/4088, 3895/8128, 3803/7936,
-  5233/10920, 3435/7168, 15701/32764, 2617/5461, 1961/4092, 2607/5440,
-  7729/16128, 7361/15360, 15703/32767, 981/2047, 15689/32736,
-  15643/32640, 5153/10752, 14723/30720, 15697/32752, 7837/16352,
-  7791/16256, 7607/15872, 2243/4680, 15703/32764, 6871/14336,
-  11779/24576, 2615/5456, 3911/8160, 3865/8064, 15705/32767,
-  1227/2560, 7849/16376, 15675/32704, 15583/32512, 15215/31744,
-  2617/5460, 13743/28672, 15691/32736, 1043/2176, 15461/32256,
-  2945/6144, 15699/32752, 3919/8176, 487/1016, 15703/32760, 951/1984,
-  15705/32764, 7853/16383, 3923/8184, 7823/16320, 859/1792,
-  15707/32767, 3925/8188, 15677/32704, 15585/32512, 7363/15360,
-  151/315, 5231/10912, 15647/32640, 2209/4608, 13745/28672,
-  15701/32752, 7839/16352, 7793/16256, 4909/10240, 349/728,
-  7609/15872, 15707/32764, 5891/12288, 7847/16368, 163/340, 1933/4032,
-  15709/32767, 7851/16376, 15679/32704, 6873/14336, 15587/32512,
-  7853/16380, 1841/3840, 3927/8191, 15695/32736, 15649/32640,
-  5155/10752, 11783/24576, 15703/32752, 35/73, 11785/24576,
-  7849/16368, 3913/8160, 15713/32767, 1289/2688, 7853/16376,
-  15683/32704, 15591/32512, 1571/3276, 3683/7680, 6875/14336,
-  5233/10912, 15653/32640, 15469/32256, 5893/12288, 15707/32752,
-  3921/8176, 1949/4064, 5237/10920, 15713/32764, 2619/5461, 1903/3968,
-  4911/10240, 3925/8184, 2609/5440, 13751/28672, 2245/4681, 1105/2304,
-  3927/8188, 15685/32704, 15593/32512, 7367/15360, 15701/32736,
-  3131/6528, 1719/3584, 683/1424, 7843/16352, 7797/16256, 15713/32760,
-  15715/32764, 7613/15872, 2947/6144, 2617/5456, 1957/4080, 507/1057,
-  967/2016, 7855/16376, 2241/4672, 13753/28672, 15595/32512, 873/1820,
-  3929/8191, 15227/31744, 15703/32736, 307/640, 15473/32256,
-  11789/24576, 15711/32752, 1961/4088, 3899/8128, 449/936, 6877/14336,
-  15717/32764, 7859/16383, 3807/7936, 1963/4092, 7829/16320,
-  14737/30720, 15719/32767, 2579/5376, 5235/10912, 15659/32640,
-  7369/15360, 15475/32256, 15713/32752, 7845/16352, 7799/16256,
-  403/840, 15719/32764, 3439/7168, 7615/15872, 11791/24576,
-  7853/16368, 261/544, 15721/32767, 4913/10240, 3869/8064, 7857/16376,
-  15691/32704, 15599/32512, 7859/16380, 13757/28672, 15231/31744,
-  15707/32736, 15661/32640, 737/1536, 15715/32752, 3923/8176,
-  975/2032, 15719/32760, 15721/32764, 7861/16383, 119/248, 7831/16320,
-  6879/14336, 15723/32767, 3929/8188, 7739/16128, 15693/32704,
-  14741/30720, 131/273, 15709/32736, 15233/31744, 5221/10880,
-  13759/28672, 15717/32752, 15479/32256, 1121/2336, 2457/5120,
-  15721/32760, 7801/16256, 15723/32764, 5897/12288, 7855/16368,
-  7617/15872, 979/2040, 15725/32767, 7859/16376, 215/448, 1123/2340,
-  15603/32512, 14743/30720, 3931/8191, 5237/10912, 3133/6528,
-  15235/31744, 11795/24576, 15719/32752, 981/2044, 15481/32256,
-  1747/3640, 13761/28672, 3901/8128, 15725/32764, 1843/3840,
-  2621/5461, 491/1023, 15721/32752, 7849/16352, 5161/10752, 3145/6552,
-  7803/16256, 15727/32764, 7373/15360, 13763/28672, 11797/24576,
-  2619/5456, 3917/8160, 2247/4681, 7619/15872, 7861/16376,
-  15699/32704, 553/1152, 2621/5460, 15607/32512, 14747/30720,
-  3441/7168, 15715/32736, 5223/10880, 15239/31744, 5899/12288,
-  15723/32752, 3925/8176, 15485/32256, 15727/32760, 1951/4064,
-  15729/32764, 7865/16383, 1229/2560, 3929/8184, 13765/28672,
-  1567/3264, 15731/32767, 1905/3968, 3931/8188, 2243/4672, 2581/5376,
-  14749/30720, 169/352, 15671/32640, 6883/14336, 15241/31744,
-  15725/32752, 7851/16352, 15487/32256, 749/1560, 7805/16256,
-  15731/32764, 1475/3072, 7859/16368, 653/1360, 15733/32767,
-  7621/15872, 7863/16376, 13767/28672, 15703/32704, 121/252,
-  3933/8191, 1429/2976, 4917/10240, 15673/32640, 11801/24576,
-  15727/32752, 15243/31744, 1963/4088, 15731/32760, 1721/3584,
-  15733/32764, 3903/8128, 7867/16383, 655/1364, 461/960, 15735/32767,
-  983/2047, 15721/32736, 1045/2176, 14753/30720, 15729/32752,
-  7853/16352, 15245/31744, 15733/32760, 2213/4608, 15735/32764,
-  7807/16256, 6885/14336, 11803/24576, 7861/16368, 3919/8160,
-  15737/32767, 2459/5120, 7865/16376, 15707/32704, 7623/15872,
-  7867/16380, 1291/2688, 13771/28672, 5241/10912, 15677/32640,
-  2951/6144, 15731/32752, 561/1168, 15247/31744, 1049/2184,
-  15493/32256, 15737/32764, 61/127, 7813/16256, 15503/32256,
-  15257/31744, 2953/6144, 7867/16368, 15749/32767, 1961/4080,
-  7871/16376, 13781/28672, 15719/32704, 7873/16380, 3937/8191,
-  323/672, 7629/15872, 5245/10912, 2461/5120, 15689/32640,
-  11813/24576, 15743/32752, 1965/4088, 5249/10920, 6891/14336,
-  15749/32764, 2625/5461, 3907/8128, 2215/4608, 15259/31744,
-  1967/4092, 14767/30720, 15751/32767, 523/1088, 15737/32736,
-  923/1920, 15745/32752, 1123/2336, 15749/32760, 15751/32764,
-  7815/16256, 1723/3584, 15261/31744, 11815/24576, 2623/5456,
-  15753/32767, 3923/8160, 4923/10240, 7873/16376, 15723/32704, 25/52,
-  15631/32512, 3877/8064, 13785/28672, 7631/15872, 15739/32736,
-  5231/10880, 1477/3072, 15747/32752, 3931/8176, 15751/32760,
-  15753/32764, 7877/16383, 977/2032, 15509/32256, 15263/31744,
-  3935/8184, 6893/14336, 15755/32767, 7847/16320, 3937/8188,
-  14771/30720, 15725/32704, 1969/4095, 2585/5376, 477/992, 3139/6528,
-  13787/28672, 15749/32752, 7863/16352, 1231/2560, 5251/10920,
-  15755/32764, 7817/16256, 15511/32256, 5909/12288, 7871/16368,
-  15265/31744, 2251/4681, 327/680, 7875/16376, 3447/7168, 15727/32704,
-  7877/16380, 14773/30720, 3939/8191, 15635/32512, 277/576,
-  15743/32736, 7633/15872, 15697/32640, 11819/24576, 15751/32752,
-  983/2044, 3151/6552, 13789/28672, 15757/32764, 7387/15360,
-  7879/16383, 3909/8128, 5171/10752, 177/368, 7865/16352, 2251/4680,
-  15759/32764, 1847/3840, 7819/16256, 13791/28672, 15515/32256,
-  11821/24576, 7873/16368, 15761/32767, 15269/31744, 785/1632,
-  7877/16376, 15731/32704, 7879/16380, 14777/30720, 15639/32512,
-  431/896, 5249/10912, 15701/32640, 7635/15872, 5911/12288, 685/1424,
-  3933/8176, 1751/3640, 15761/32764, 2627/5461, 1955/4064, 2463/5120,
-  15517/32256, 127/264, 13793/28672, 15763/32767, 2617/5440,
-  15271/31744, 3939/8188, 15733/32704, 15641/32512, 14779/30720,
-  7759/16128, 15749/32736, 6897/14336, 15703/32640, 1909/3968,
-  15757/32752, 7867/16352, 15761/32760, 15763/32764, 7821/16256,
-  739/1536, 2625/5456, 15765/32767, 1963/4080, 15273/31744,
-  7879/16376, 13795/28672, 15735/32704, 2627/5460, 3941/8191,
-  15643/32512, 485/1008, 15751/32736, 4927/10240, 1047/2176,
-  11825/24576, 15759/32752, 7637/15872, 281/584, 15763/32760,
-  3449/7168, 15765/32764, 7883/16383, 3911/8128, 15521/32256, 179/372,
-  7391/15360, 15767/32767, 7853/16320, 985/2047, 2587/5376,
-  5251/10912, 14783/30720, 15707/32640, 15761/32752, 3819/7936,
-  7869/16352, 1051/2184, 15767/32764, 6899/14336, 7823/16256,
-  11827/24576, 15523/32256, 7877/16368, 15769/32767, 77/160,
-  7881/16376, 15739/32704, 15277/31744, 7883/16380, 15647/32512,
-  13799/28672, 15755/32736, 3881/8064, 15709/32640, 2957/6144,
-  15763/32752, 3935/8176, 7639/15872, 15767/32760, 15769/32764,
-  7885/16383, 489/1016, 1313/2728, 1725/3584, 2253/4681, 1571/3264,
-  3941/8188, 7393/15360, 15741/32704, 219/455, 15649/32512,
-  15757/32736, 1109/2304, 13801/28672, 5237/10880, 15765/32752,
-  4929/10240, 7871/16352, 1213/2520, 955/1984, 15771/32764,
-  7825/16256, 5915/12288, 7879/16368, 15527/32256, 15773/32767,
-  491/1020, 7883/16376, 6901/14336, 2249/4672, 1577/3276, 3697/7680,
-  3943/8191, 15651/32512, 5253/10912, 647/1344, 15713/32640,
-  11831/24576, 15767/32752, 7827/16256, 11833/24576, 2627/5456,
-  15777/32767, 5177/10752, 3929/8160, 7885/16376, 15747/32704,
-  2629/5460, 1849/3840, 15655/32512, 6903/14336, 1433/2976, 3883/8064,
-  5239/10880, 5917/12288, 15771/32752, 3937/8176, 3155/6552,
-  15777/32764, 7889/16383, 7643/15872, 4931/10240, 1957/4064,
-  3941/8184, 13807/28672, 509/1057, 2219/4608, 7859/16320, 3943/8188,
-  15749/32704, 7397/15360, 15657/32512, 5255/10912, 863/1792,
-  15719/32640, 15773/32752, 1125/2336, 1753/3640, 15779/32764,
-  1911/3968, 7829/16256, 2959/6144, 7883/16368, 15781/32767,
-  15535/32256, 131/272, 7887/16376, 13809/28672, 15751/32704,
-  1127/2340, 3945/8191, 15289/31744, 15659/32512, 1233/2560,
-  15767/32736, 971/2016, 15721/32640, 11837/24576, 15775/32752,
-  1969/4088, 15779/32760, 6905/14336, 15781/32764, 7891/16383,
-  7645/15872, 3915/8128, 657/1364, 14797/30720, 15783/32767,
-  5179/10752, 7861/16320, 15661/32512, 15769/32736, 7399/15360,
-  7769/16128, 5241/10880, 15777/32752, 7877/16352, 15781/32760,
-  15783/32764, 3453/7168, 3823/7936, 7831/16256, 11839/24576,
-  7885/16368, 2255/4681, 4933/10240, 15539/32256, 3931/8160, 343/712,
-  15755/32704, 607/1260, 13813/28672, 15293/31744, 15663/32512,
-  5257/10912, 185/384, 15779/32752, 3939/8176, 5261/10920,
-  15785/32764, 2631/5461, 979/2032, 7647/15872, 3943/8184, 6907/14336,
-  15787/32767, 2621/5440, 15541/32256, 3945/8188, 14801/30720,
-  2251/4672, 1973/4095, 15665/32512, 15295/31744, 15773/32736,
-  13815/28672, 15727/32640, 7771/16128, 15781/32752, 2467/5120,
-  7879/16352, 451/936, 15787/32764, 5921/12288, 7833/16256, 239/496,
-  15789/32767, 983/2040, 7891/16376, 1727/3584, 15759/32704, 877/1820,
-  14803/30720, 3947/8191, 15667/32512, 15775/32736, 15297/31744,
-  11843/24576, 5243/10880, 15783/32752, 1943/4032, 985/2044,
-  15787/32760, 13817/28672, 15789/32764, 3701/7680, 7895/16383,
-  3917/8128, 493/1023, 15731/32640, 15785/32752, 2591/5376,
-  7881/16352, 5263/10920, 15791/32764, 7403/15360, 13819/28672,
-  11845/24576, 7835/16256, 7889/16368, 15793/32767, 3825/7936,
-  1311/2720, 7893/16376, 2221/4608, 15763/32704, 1579/3276,
-  14807/30720, 3455/7168, 15671/32512, 509/1056, 15301/31744,
-  5923/12288, 15733/32640, 15787/32752, 3887/8064, 563/1168,
-  15791/32760, 15793/32764, 7897/16383, 617/1280, 1959/4064,
-  1315/2728, 13821/28672, 15795/32767, 7651/15872, 7867/16320,
-  3947/8188, 5183/10752, 15765/32704, 14809/30720, 15673/32512,
-  15781/32736, 6911/14336, 15303/31744, 1049/2176, 15789/32752,
-  7775/16128, 7883/16352, 15793/32760, 15795/32764, 1481/3072,
-  7837/16256, 7891/16368, 15797/32767, 1913/3968, 1967/4080,
-  7895/16376, 13823/28672, 15551/32256, 15767/32704, 7897/16380,
-  3949/8191, 4937/10240, 15675/32512, 5261/10912, 11849/24576,
-  15305/31744, 15737/32640, 15791/32752, 27/56, 15797/32764,
-  2633/5461, 1973/4092, 3919/8128, 3703/7680, 2257/4681, 987/2047,
-  1435/2976, 15677/32512, 14813/30720, 15793/32752, 15739/32640,
-  15307/31744, 15797/32760, 7885/16352, 1111/2304, 15799/32764,
-  6913/14336, 11851/24576, 2631/5456, 7839/16256, 15801/32767,
-  2469/5120, 7897/16376, 787/1632, 3827/7936, 2633/5460, 2253/4672,
-  5185/10752, 13827/28672, 15787/32736, 15679/32512, 2963/6144,
-  15795/32752, 5247/10880, 15309/31744, 2257/4680, 3943/8176,
-  3889/8064, 15801/32764, 7901/16383, 3457/7168, 3947/8184, 245/508,
-  15803/32767, 3949/8188, 463/960, 395/819, 5263/10912, 15681/32512,
-  13829/28672, 15797/32752, 15743/32640, 4939/10240, 5267/10920,
-  7887/16352, 15311/31744, 15803/32764, 2593/5376, 5927/12288,
-  7895/16368, 7841/16256, 15805/32767, 6915/14336, 7899/16376, 41/85,
-  6917/14336, 5265/10912, 15687/32512, 5929/12288, 15803/32752,
-  15749/32640, 5269/10920, 3945/8176, 15809/32764, 2635/5461,
-  1297/2688, 15317/31744, 4941/10240, 13835/28672, 359/744,
-  15811/32767, 1961/4064, 3951/8188, 525/1088, 1853/3840, 15797/32736,
-  15689/32512, 3459/7168, 15805/32752, 15751/32640, 15809/32760,
-  7891/16352, 15811/32764, 7783/16128, 15319/31744, 2965/6144,
-  2633/5456, 2259/4681, 7845/16256, 13837/28672, 7903/16376,
-  1969/4080, 527/1092, 15783/32704, 3953/8191, 5189/10752, 1915/3968,
-  2471/5120, 15799/32736, 15691/32512, 11861/24576, 15807/32752,
-  5251/10880, 6919/14336, 15811/32760, 1973/4088, 15813/32764,
-  7907/16383, 139/288, 15321/31744, 1975/4092, 14827/30720,
-  15815/32767, 3923/8128, 5267/10912, 3707/7680, 15693/32512,
-  15809/32752, 3151/6528, 251/520, 7893/16352, 15815/32764, 865/1792,
-  15323/31744, 11863/24576, 7901/16368, 15817/32767, 7847/16256,
-  4943/10240, 7905/16376, 1313/2720, 7907/16380, 15787/32704,
-  15571/32256, 13841/28672, 3831/7936, 15803/32736, 15695/32512,
-  1483/3072, 15811/32752, 15757/32640, 3163/6552, 3947/8176,
-  15817/32764, 7909/16383, 3893/8064, 15325/31744, 6921/14336,
-  1317/2728, 15819/32767, 981/2032, 3953/8188, 14831/30720,
-  7879/16320, 659/1365, 5191/10752, 7663/15872, 15805/32736,
-  13843/28672, 15697/32512, 15813/32752, 309/640, 15817/32760,
-  7895/16352, 15819/32764, 7787/16128, 5933/12288, 15327/31744,
-  7903/16368, 15821/32767, 7849/16256, 3461/7168, 7907/16376, 197/408,
-  7909/16380, 14833/30720, 15791/32704, 3955/8191, 2225/4608, 479/992,
-  15699/32512, 11867/24576, 15815/32752, 15761/32640, 13845/28672,
-  5273/10920, 141/292, 15821/32764, 7417/15360, 2637/5461, 649/1344,
-  15701/32512, 15817/32752, 15763/32640, 1217/2520, 7897/16352,
-  15823/32764, 3709/7680, 13847/28672, 7789/16128, 11869/24576,
-  85/176, 15825/32767, 15331/31744, 7851/16256, 7909/16376, 3941/8160,
-  879/1820, 15795/32704, 14837/30720, 1731/3584, 15811/32736,
-  3833/7936, 15703/32512, 5935/12288, 15819/32752, 1051/2176,
-  15823/32760, 3949/8176, 15825/32764, 7913/16383, 2473/5120,
-  3895/8064, 13849/28672, 3953/8184, 2261/4681, 15333/31744,
-  1963/4064, 3955/8188, 7883/16320, 14839/30720, 15581/32256,
-  5271/10912, 6925/14336, 7667/15872, 15705/32512, 15821/32752,
-  15767/32640, 1055/2184, 7899/16352, 15827/32764, 371/768,
-  7907/16368, 15829/32767, 7853/16256, 15335/31744, 13851/28672,
-  7911/16376, 657/1360, 7913/16380, 2257/4672, 3957/8191, 15583/32256,
-  4947/10240, 15815/32736, 11873/24576, 15707/32512, 1917/3968,
-  15823/32752, 15769/32640, 3463/7168, 2261/4680, 1975/4088,
-  15829/32764, 7915/16383, 487/1008, 659/1364, 7421/15360,
-  15831/32767, 3927/8128, 43/89, 5195/10752, 15817/32736, 14843/30720,
-  15709/32512, 15825/32752, 7669/15872, 5257/10880, 15829/32760,
-  7901/16352, 15831/32764, 6927/14336, 11875/24576, 7793/16128,
-  719/1488, 15833/32767, 1237/2560, 7855/16256, 7913/16376,
-  15339/31744, 3943/8160, 1583/3276, 15803/32704, 13855/28672,
-  15587/32256, 5273/10912, 2969/6144, 15711/32512, 15827/32752,
-  3835/7936, 15773/32640, 1759/3640, 3951/8176, 15833/32764,
-  2639/5461, 433/896, 3955/8184, 15835/32767, 491/1016, 3957/8188,
-  7423/15360, 2629/5440, 1979/4095, 2227/4608, 15821/32736,
-  13857/28672, 15713/32512, 15829/32752, 4949/10240, 3155/6528,
-  15833/32760, 7671/15872, 1129/2336, 15835/32764, 5939/12288,
-  7795/16128, 2637/5456, 15837/32767, 6929/14336, 7857/16256,
-  7915/16376, 29/60, 3959/8191, 15823/32736, 5197/10752, 11879/24576,
-  15831/32752, 15715/32512, 13859/28672, 3167/6552, 5259/10880,
-  14849/30720, 15837/32764, 247/511, 14851/30720, 13861/28672,
-  11881/24576, 7913/16368, 73/151, 2599/5376, 7917/16376, 7859/16256,
-  7919/16380, 263/544, 3713/7680, 6931/14336, 15827/32736,
-  15595/32256, 5941/12288, 15835/32752, 15719/32512, 15839/32760,
-  15781/32640, 15841/32764, 3953/8176, 7921/16383, 3837/7936,
-  4951/10240, 13863/28672, 1319/2728, 15843/32767, 557/1152,
-  3959/8188, 1965/4064, 7427/15360, 1439/2976, 1733/3584, 15837/32752,
-  15721/32512, 2263/4680, 5261/10880, 15843/32764, 7907/16352,
-  7675/15872, 2971/6144, 7915/16368, 15845/32767, 7799/16128,
-  13865/28672, 7919/16376, 7861/16256, 7921/16380, 1973/4080,
-  3961/8191, 15351/31744, 619/1280, 5277/10912, 15599/32256,
-  11885/24576, 15839/32752, 15723/32512, 6933/14336, 5281/10920,
-  3157/6528, 15845/32764, 1977/4088, 2641/5461, 1919/3968,
-  14857/30720, 1979/4092, 15847/32767, 325/672, 15833/32736,
-  7429/15360, 15601/32256, 15841/32752, 15725/32512, 3169/6552,
-  15787/32640, 15847/32764, 7909/16352, 3467/7168, 7677/15872,
-  11887/24576, 2639/5456, 15849/32767, 4953/10240, 7801/16128, 89/184,
-  7863/16256, 2641/5460, 3947/8160, 13869/28672, 15355/31744,
-  15835/32736, 743/1536, 15843/32752, 15727/32512, 1219/2520,
-  5263/10880, 15849/32764, 565/1168, 7925/16383, 3839/7936,
-  6935/14336, 3959/8184, 15851/32767, 3901/8064, 14861/30720,
-  3961/8188, 983/2032, 283/585, 15357/31744, 5279/10912, 13871/28672,
-  15605/32256, 15845/32752, 2477/5120, 15729/32512, 1761/3640,
-  15791/32640, 15851/32764, 7911/16352, 5945/12288, 7679/15872,
-  7919/16368, 15853/32767, 867/1792, 7923/16376, 7865/16256,
-  14863/30720, 1585/3276, 329/680, 3963/8191, 15359/31744,
-  15839/32736, 11891/24576, 15607/32256, 689/1424, 13873/28672,
-  15731/32512, 15851/32760, 929/1920, 15853/32764, 989/2044,
-  7927/16383, 15/31, 481/992, 15881/32752, 353/728, 15887/32764,
-  7929/16352, 931/1920, 15765/32512, 13903/28672, 15641/32256,
-  11917/24576, 15889/32767, 7937/16368, 15393/31744, 7941/16376,
-  611/1260, 1319/2720, 14897/30720, 7883/16256, 869/1792, 15875/32736,
-  7697/15872, 5959/12288, 15883/32752, 15887/32760, 15889/32764,
-  7945/16383, 3965/8176, 15829/32640, 15767/32512, 2483/5120,
-  15643/32256, 13905/28672, 15891/32767, 1323/2728, 15395/31744,
-  3971/8188, 1971/4064, 14899/30720, 3911/8064, 15877/32736,
-  6953/14336, 3849/7936, 15885/32752, 15889/32760, 15891/32764,
-  1133/2336, 5277/10880, 15769/32512, 745/1536, 15893/32767,
-  7939/16368, 15397/31744, 13907/28672, 7943/16376, 227/468,
-  3973/8191, 1979/4080, 7885/16256, 7823/16128, 4967/10240,
-  5293/10912, 11921/24576, 7699/15872, 15887/32752, 3477/7168,
-  5297/10920, 15893/32764, 2649/5461, 1983/4088, 15833/32640,
-  15771/32512, 15647/32256, 7451/15360, 15895/32767, 1985/4092,
-  15399/31744, 993/2047, 163/336, 15881/32736, 14903/30720,
-  15889/32752, 1925/3968, 15893/32760, 15895/32764, 7933/16352,
-  3167/6528, 6955/14336, 15773/32512, 11923/24576, 15649/32256,
-  2271/4681, 2647/5456, 621/1280, 7945/16376, 15401/31744, 883/1820,
-  3959/8160, 7887/16256, 13911/28672, 7825/16128, 15883/32736,
-  2981/6144, 15891/32752, 7701/15872, 3179/6552, 15897/32764,
-  7949/16383, 3967/8176, 5279/10880, 15775/32512, 1739/3584,
-  15899/32767, 361/744, 7453/15360, 3973/8188, 15403/31744, 1987/4095,
-  493/1016, 559/1152, 5295/10912, 13913/28672, 691/1424, 4969/10240,
-  757/1560, 3851/7936, 15899/32764, 7935/16352, 15839/32640,
-  15777/32512, 5963/12288, 15653/32256, 15901/32767, 7943/16368,
-  6957/14336, 7947/16376, 3727/7680, 7949/16380, 15405/31744,
-  3975/8191, 33/68, 7889/16256, 2609/5376, 15887/32736, 11927/24576,
-  15895/32752, 13915/28672, 1223/2520, 14909/30720, 15901/32764,
-  7703/15872, 7951/16383, 15903/32764, 963/1984, 7937/16352,
-  14911/30720, 5281/10880, 13917/28672, 15781/32512, 11929/24576,
-  15905/32767, 5219/10752, 7945/16368, 7949/16376, 7951/16380,
-  15409/31744, 15875/32704, 233/480, 7891/16256, 6959/14336,
-  5297/10912, 7829/16128, 5965/12288, 15899/32752, 1767/3640,
-  15905/32764, 2651/5461, 567/1168, 7705/15872, 3169/6528, 4971/10240,
-  15783/32512, 13919/28672, 15907/32767, 3973/8184, 2237/4608,
-  3975/8188, 15411/31744, 2641/5440, 7457/15360, 1973/4064,
-  15893/32736, 435/896, 15901/32752, 3181/6552, 15907/32764,
-  7939/16352, 15847/32640, 3853/7936, 15785/32512, 2983/6144,
-  15909/32767, 2649/5456, 15661/32256, 13921/28672, 7951/16376,
-  2651/5460, 3977/8191, 15879/32704, 1981/4080, 15413/31744,
-  7893/16256, 1243/2560, 1445/2976, 7831/16128, 11933/24576,
-  15903/32752, 6961/14336, 15907/32760, 15909/32764, 185/381,
-  1985/4088, 5283/10880, 7707/15872, 15787/32512, 14917/30720,
-  2273/4681, 1987/4092, 5221/10752, 15415/31744, 3947/8128,
-  7459/15360, 5299/10912, 979/2016, 15905/32752, 5303/10920,
-  15911/32764, 7941/16352, 3481/7168, 15851/32640, 1927/3968,
-  15789/32512, 11935/24576, 15913/32767, 7949/16368, 4973/10240,
-  15665/32256, 7953/16376, 1591/3276, 2269/4672, 1321/2720,
-  13925/28672, 15417/31744, 7895/16256, 15899/32736, 373/768,
-  15907/32752, 2273/4680, 15913/32764, 7957/16383, 3971/8176,
-  15853/32640, 15791/32512, 7709/15872, 6963/14336, 15915/32767,
-  1325/2728, 15667/32256, 14921/30720, 3977/8188, 17/35, 7927/16320,
-  987/2032, 15419/31744, 15901/32736, 13927/28672, 3917/8064,
-  15909/32752, 2487/5120, 15913/32760, 15915/32764, 7943/16352,
-  1057/2176, 5969/12288, 15793/32512, 3855/7936, 15917/32767,
-  7951/16368, 1741/3584, 7955/16376, 14923/30720, 7957/16380,
-  3979/8191, 15887/32704, 991/2040, 7897/16256, 15421/31744, 171/352,
-  11939/24576, 7835/16128, 15911/32752, 13929/28672, 1061/2184,
-  3731/7680, 15917/32764, 2653/5461, 993/2044, 15857/32640,
-  15795/32512, 7711/15872, 15919/32767, 497/1023, 15423/31744,
-  15905/32736, 653/1344, 15913/32752, 15917/32760, 15919/32764,
-  7463/15360, 1135/2336, 13931/28672, 15859/32640, 11941/24576,
-  15797/32512, 15921/32767, 241/496, 7957/16376, 2239/4608, 379/780,
-  15891/32704, 14927/30720, 793/1632, 3483/7168, 7899/16256,
-  15907/32736, 15425/31744, 5971/12288, 15915/32752, 7837/16128,
-  15919/32760, 15921/32764, 7961/16383, 3973/8176, 311/640,
-  15799/32512, 13933/28672, 15923/32767, 3977/8184, 7713/15872,
-  173/356, 5225/10752, 7931/16320, 14929/30720, 1975/4064, 5303/10912,
-  6967/14336, 15427/31744, 15917/32752, 3919/8064, 1769/3640,
-  15923/32764, 7947/16352, 15863/32640, 1493/3072, 15801/32512,
-  2275/4681, 7955/16368, 3857/7936, 13935/28672, 7959/16376,
-  15677/32256, 7961/16380, 3981/8191, 15895/32704, 661/1360,
-  4977/10240, 7901/16256, 15911/32736, 11945/24576, 15429/31744,
-  15919/32752, 871/1792, 15923/32760, 15925/32764, 7963/16383,
-  1987/4088, 3173/6528, 15803/32512, 3733/7680, 15927/32767, 663/1364,
-  7715/15872, 995/2047, 3951/8128, 14933/30720, 15913/32736,
-  15431/31744, 15921/32752, 35/72, 15927/32764, 7949/16352,
-  6969/14336, 5289/10880, 11947/24576, 15805/32512, 15929/32767,
-  7957/16368, 2489/5120, 7961/16376, 1929/3968, 7963/16380,
-  5227/10752, 15899/32704, 3967/8160, 13939/28672, 7903/16256,
-  5305/10912, 2987/6144, 15923/32752, 15433/31744, 5309/10920,
-  7841/16128, 15929/32764, 2655/5461, 3975/8176, 15869/32640,
-  3485/7168, 15807/32512, 15931/32767, 3979/8184, 1867/3840,
-  3981/8188, 7717/15872, 1991/4095, 15901/32704, 529/1088, 247/508,
-  1447/2976, 13941/28672, 15925/32752, 4979/10240, 15929/32760,
-  15435/31744, 15931/32764, 1307/2688, 7951/16352, 15871/32640,
-  5975/12288, 15809/32512, 15933/32767, 2653/5456, 6971/14336,
-  7963/16376, 7469/15360, 177/364, 3859/7936, 3983/8191, 15903/32704,
-  7965/16376, 7967/16380, 965/1984, 15907/32704, 7471/15360,
-  1323/2720, 6973/14336, 7907/16256, 15923/32736, 5977/12288, 179/368,
-  3187/6552, 15937/32764, 7969/16383, 2615/5376, 15441/31744,
-  3977/8176, 4981/10240, 15877/32640, 13947/28672, 2277/4681,
-  15815/32512, 1327/2728, 3983/8188, 7721/15872, 15909/32704, 467/960,
-  1977/4064, 15925/32736, 3487/7168, 15933/32752, 15937/32760,
-  15939/32764, 3923/8064, 7955/16352, 15443/31744, 5293/10880,
-  2989/6144, 15941/32767, 15817/32512, 7963/16368, 13949/28672,
-  7967/16376, 613/1260, 3985/8191, 5231/10752, 2273/4672, 3861/7936,
-  397/816, 2491/5120, 7909/16256, 5309/10912, 11957/24576,
-  15935/32752, 6975/14336, 253/520, 15941/32764, 2657/5461, 1121/2304,
-  1989/4088, 15445/31744, 15881/32640, 14947/30720, 15943/32767,
-  15819/32512, 181/372, 7723/15872, 2647/5440, 3737/7680, 3955/8128,
-  15929/32736, 15937/32752, 15941/32760, 15943/32764, 109/224,
-  15883/32640, 15447/31744, 11959/24576, 15945/32767, 2655/5456,
-  15821/32512, 4983/10240, 7969/16376, 2657/5460, 15915/32704,
-  15697/32256, 13953/28672, 3971/8160, 1931/3968, 15931/32736,
-  7911/16256, 1495/3072, 693/1424, 15943/32760, 15945/32764,
-  7973/16383, 3979/8176, 7849/16128, 1059/2176, 15449/31744,
-  6977/14336, 15947/32767, 3983/8184, 15823/32512, 14951/30720,
-  3985/8188, 1993/4095, 15917/32704, 5233/10752, 7943/16320,
-  7725/15872, 13955/28672, 5311/10912, 989/2032, 15941/32752,
-  623/1280, 1063/2184, 15947/32764, 1137/2336, 3925/8064, 15887/32640,
-  5981/12288, 15451/31744, 15949/32767, 257/528, 15825/32512,
-  3489/7168, 7971/16376, 14953/30720, 1139/2340, 3987/8191,
-  15919/32704, 2243/4608, 331/680, 3863/7936, 15935/32736, 7913/16256,
-  11963/24576, 15943/32752, 13957/28672, 15947/32760, 7477/15360,
-  15949/32764, 7975/16383, 995/2044, 2617/5376, 15889/32640,
-  15453/31744, 15951/32767, 7727/15872, 15937/32736, 3957/8128,
-  15945/32752, 15949/32760, 15951/32764, 3739/7680, 13959/28672,
-  7961/16352, 1963/4032, 5297/10880, 11965/24576, 2279/4681,
-  15455/31744, 7969/16368, 15829/32512, 7973/16376, 1595/3276,
-  14957/30720, 15923/32704, 1745/3584, 3973/8160, 483/992, 7915/16256,
-  5983/12288, 15947/32752, 409/840, 15953/32764, 2659/5461, 3981/8176,
-  2493/5120, 7853/16128, 15893/32640, 13961/28672, 15955/32767,
-  3985/8184, 15457/31744, 15831/32512, 3987/8188, 2275/4672,
-  14959/30720, 15707/32256, 2649/5440, 6981/14336, 15941/32736,
-  7729/15872, 1979/4064, 15949/32752, 2279/4680, 15955/32764,
-  7963/16352, 187/384, 15957/32767, 2657/5456, 15833/32512,
-  15459/31744, 13963/28672, 7975/16376, 2659/5460, 3989/8191,
-  15927/32704, 1987/4080, 15709/32256, 4987/10240, 15943/32736,
-  11969/24576, 7917/16256, 3865/7936, 15951/32752, 3491/7168,
-  3191/6552, 15957/32764, 7979/16383, 1991/4088, 5299/10880,
-  7855/16128, 7481/15360, 15959/32767, 1993/4092, 15835/32512,
-  15461/31744, 997/2047, 7949/16320, 5237/10752, 14963/30720,
-  5315/10912, 3959/8128, 7731/15872, 15953/32752, 1773/3640,
-  15959/32764, 6983/14336, 7965/16352, 11971/24576, 15899/32640,
-  491/1008, 15961/32767, 7973/16368, 1247/2560, 15837/32512,
-  7977/16376, 15463/31744, 7979/16380, 15931/32704, 13967/28672,
-  265/544, 15713/32256, 15947/32736, 2993/6144, 7919/16256,
-  15955/32752, 1933/3968, 15959/32760, 15961/32764, 7981/16383,
-  569/1168, 15901/32640, 873/1792, 15963/32767, 1329/2728,
-  15839/32512, 7483/15360, 3989/8188, 15465/31744, 19/39, 15933/32704,
-  7951/16320, 2245/4608, 13969/28672, 15949/32736, 495/1016,
-  15957/32752, 4989/10240, 15961/32760, 7733/15872, 15963/32764,
-  7967/16352, 5987/12288, 5301/10880, 3929/8064, 515/1057, 725/1488,
-  6985/14336, 15841/32512, 7979/16376, 1871/3840, 7981/16380,
-  15467/31744, 3991/8191, 15935/32704, 497/1020, 5239/10752,
-  5317/10912, 11975/24576, 7921/16256, 15959/32752, 13971/28672,
-  5321/10920, 14969/30720, 15965/32764, 3867/7936, 2661/5461, 249/511,
-  3193/6552, 15967/32764, 7735/15872, 14971/30720, 13973/28672,
-  7969/16352, 11977/24576, 15907/32640, 15969/32767, 655/1344,
-  2659/5456, 15845/32512, 347/712, 887/1820, 15471/31744, 3743/7680,
-  2277/4672, 6987/14336, 3977/8160, 15721/32256, 15955/32736,
-  5989/12288, 7923/16256, 15963/32752, 2281/4680, 15969/32764,
-  7985/16383, 967/1984, 3985/8176, 4991/10240, 5303/10880,
-  13975/28672, 15971/32767, 1123/2304, 3989/8184, 15847/32512,
-  3991/8188, 15473/31744, 15941/32704, 7487/15360, 1591/3264,
-  1747/3584, 5319/10912, 1981/4064, 15965/32752, 5323/10920,
-  15971/32764, 7737/15872, 7971/16352, 2995/6144, 15911/32640,
-  15973/32767, 3931/8064, 7979/16368, 13977/28672, 15849/32512,
-  7983/16376, 1597/3276, 3993/8191, 15475/31744, 15943/32704, 39/80,
-  15959/32736, 15725/32256, 11981/24576, 15967/32752, 7925/16256,
-  6989/14336, 15971/32760, 15973/32764, 7987/16383, 1993/4088,
-  3869/7936, 15913/32640, 14977/30720, 15975/32767, 665/1364,
-  2621/5376, 15945/32704, 15477/31744, 7957/16320, 7489/15360,
-  1451/2976, 15727/32256, 15969/32752, 3963/8128, 15973/32760,
-  15975/32764, 3495/7168, 1139/2336, 7739/15872, 11983/24576,
-  1061/2176, 15977/32767, 4993/10240, 7981/16368, 983/2016,
-  7985/16376, 15853/32512, 1141/2340, 15947/32704, 13981/28672,
-  15479/31744, 3979/8160, 5321/10912, 749/1536, 15971/32752,
-  7927/16256, 355/728, 15977/32764, 2663/5461, 3987/8176, 1935/3968,
-  15917/32640, 6991/14336, 15979/32767, 3991/8184, 7865/16128,
-  14981/30720, 3993/8188, 15855/32512, 1997/4095, 15949/32704,
-  15481/31744, 2653/5440, 13983/28672, 515/1056, 15731/32256,
-  2497/5120, 15973/32752, 991/2032, 1229/2520, 15979/32764,
-  7975/16352, 5993/12288, 7741/15872, 15919/32640, 2283/4681,
-  2661/5456, 437/896, 7987/16376, 15857/32512, 14983/30720, 2663/5460,
-  3995/8191, 15951/32704, 199/408, 15483/31744, 15967/32736,
-  11987/24576, 15733/32256, 15975/32752, 13985/28672, 7929/16256,
-  15979/32760, 1873/3840, 15981/32764, 7991/16383, 997/2044,
-  5307/10880, 3871/7936, 15983/32767, 499/1023, 7961/16320,
-  15485/31744, 5323/10912, 5245/10752, 15977/32752, 3965/8128,
-  761/1560, 15983/32764, 7493/15360, 13987/28672, 7977/16352,
-  11989/24576, 15923/32640, 15985/32767, 7743/15872, 7985/16368,
-  281/576, 7989/16376, 15861/32512, 7991/16380, 14987/30720,
-  15955/32704, 3497/7168, 1327/2720, 15487/31744, 15971/32736,
-  5995/12288, 15737/32256, 15979/32752, 7931/16256, 15983/32760,
-  15985/32764, 7993/16383, 1249/2560, 3989/8176, 13989/28672,
-  3185/6528, 15987/32767, 121/248, 3995/8188, 2623/5376, 15957/32704,
-  14989/30720, 7963/16320, 6995/14336, 15973/32736, 15489/31744,
-  15981/32752, 15739/32256, 3197/6552, 1983/4064, 15987/32764,
-  7979/16352, 1499/3072, 5309/10880, 15989/32767, 7987/16368,
-  7745/15872, 13991/28672, 7991/16376, 3935/8064, 7993/16380,
-  15865/32512, 3997/8191, 15959/32704, 4997/10240, 1991/4080,
-  5325/10912, 11993/24576, 15491/31744, 15983/32752, 1749/3584,
-  5329/10920, 7933/16256, 15989/32764, 2665/5461, 285/584, 937/1920,
-  15991/32767, 1997/4092, 3873/7936, 999/2047, 15961/32704, 531/1088,
-  14993/30720, 15977/32736, 15493/31744, 695/1424, 2249/4608,
-  15989/32760, 3967/8128, 15991/32764, 6997/14336, 7981/16352,
-  11995/24576, 15931/32640, 15993/32767, 2499/5120, 2663/5456,
-  7747/15872, 7993/16376, 41/84, 15963/32704, 13995/28672, 3983/8160,
-  15979/32736, 2999/6144, 15987/32752, 15495/31744, 15991/32760,
-  15745/32256, 15993/32764, 7935/16256, 7997/16383, 3991/8176,
-  3499/7168, 5311/10880, 2285/4681, 3995/8184, 3749/7680, 3997/8188,
-  1937/3968, 1999/4095, 15965/32704, 7967/16320, 13997/28672,
-  5327/10912, 4999/10240, 15989/32752, 15497/31744, 1777/3640,
-  5249/10752, 15995/32764, 21/43, 7939/16256, 5251/10752, 15503/31744,
-  5001/10240, 3993/8176, 14003/28672, 16003/32767, 15941/32640,
-  3997/8184, 3999/8188, 969/1984, 15973/32704, 3751/7680, 2657/5440,
-  3501/7168, 15989/32736, 15997/32752, 16001/32760, 16003/32764,
-  1985/4064, 15755/32256, 15505/31744, 1141/2336, 3001/6144,
-  16005/32767, 15943/32640, 2665/5456, 14005/28672, 7999/16376,
-  127/260, 4001/8191, 15881/32512, 1313/2688, 7753/15872, 15975/32704,
-  2501/5120, 1993/4080, 15991/32736, 12005/24576, 15999/32752,
-  7003/14336, 1231/2520, 16005/32764, 8003/16383, 7941/16256,
-  2251/4608, 15507/31744, 1997/4088, 15007/30720, 16007/32767,
-  1063/2176, 1999/4092, 3877/7936, 15977/32704, 469/960, 5331/10912,
-  16001/32752, 1067/2184, 16007/32764, 3971/8128, 1751/3584,
-  7989/16352, 15509/31744, 12007/24576, 2287/4681, 15947/32640,
-  5003/10240, 727/1488, 8001/16376, 8003/16380, 15885/32512, 985/2016,
-  15979/32704, 14009/28672, 7755/15872, 1329/2720, 15995/32736,
-  1501/3072, 16003/32752, 16007/32760, 16009/32764, 8005/16383,
-  7943/16256, 15761/32256, 3995/8176, 15511/31744, 7005/14336,
-  16011/32767, 15949/32640, 43/88, 15011/30720, 4001/8188, 667/1365,
-  15887/32512, 2627/5376, 2283/4672, 1939/3968, 1595/3264,
-  14011/28672, 15997/32736, 1251/2560, 16005/32752, 2287/4680,
-  16011/32764, 993/2032, 15763/32256, 7991/16352, 6005/12288,
-  15513/31744, 16013/32767, 5317/10880, 7999/16368, 3503/7168,
-  8003/16376, 15013/30720, 1601/3276, 4003/8191, 15889/32512,
-  563/1152, 15983/32704, 7757/15872, 997/2040, 5333/10912,
-  12011/24576, 16007/32752, 14013/28672, 1779/3640, 7507/15360,
-  16013/32764, 2669/5461, 7945/16256, 5255/10752, 999/2044,
-  15515/31744, 16015/32767, 15953/32640, 3879/7936, 2659/5440,
-  16001/32736, 16009/32752, 16013/32760, 16015/32764, 1877/3840,
-  3973/8128, 14015/28672, 15767/32256, 7993/16352, 12013/24576,
-  16017/32767, 15517/31744, 3191/6528, 2667/5456, 8005/16376,
-  2669/5460, 15017/30720, 15893/32512, 219/448, 3989/8160, 7759/15872,
-  16003/32736, 6007/12288, 16011/32752, 3203/6552, 16017/32764,
-  8009/16383, 7947/16256, 2503/5120, 571/1168, 15769/32256,
-  14017/28672, 16019/32767, 5319/10880, 15519/31744, 4001/8184,
-  4003/8188, 15895/32512, 15019/30720, 15989/32704, 7885/16128,
-  7009/14336, 7979/16320, 485/992, 16013/32752, 5339/10920,
-  16019/32764, 1987/4064, 7995/16352, 751/1536, 16021/32767,
-  15959/32640, 8003/16368, 15521/31744, 14019/28672, 8007/16376,
-  8009/16380, 4005/8191, 15897/32512, 15991/32704, 3943/8064,
-  5007/10240, 133/272, 16007/32736, 12017/24576, 7761/15872,
-  16015/32752, 3505/7168, 16019/32760, 16021/32764, 8011/16383,
-  7949/16256, 1999/4088, 15773/32256, 7511/15360, 2289/4681,
-  15961/32640, 667/1364, 15523/31744, 1001/2047, 15899/32512,
-  15993/32704, 2629/5376, 15023/30720, 7981/16320, 16009/32736,
-  3881/7936, 16017/32752, 16021/32760, 16023/32764, 7011/14336,
-  3975/8128, 7997/16352, 12019/24576, 15775/32256, 16025/32767,
-  313/640, 8005/16368, 15525/31744, 8009/16376, 8011/16380,
-  15901/32512, 14023/28672, 2285/4672, 493/1008, 3991/8160,
-  5337/10912, 3005/6144, 16019/32752, 7763/15872, 763/1560,
-  16025/32764, 2671/5461, 7951/16256, 3999/8176, 1753/3584, 517/1057,
-  3193/6528, 4003/8184, 7513/15360, 45/92, 15527/31744, 2003/4095,
-  15903/32512, 15997/32704, 1127/2304, 14025/28672, 2661/5440,
-  16013/32736, 5009/10240, 16021/32752, 1941/3968, 3205/6552,
-  16027/32764, 497/1016, 7999/16352, 6011/12288, 15779/32256,
-  16029/32767, 15967/32640, 2669/5456, 7013/14336, 8011/16376,
-  3757/7680, 2671/5460, 15529/31744, 4007/8191, 15905/32512,
-  15999/32704, 1315/2688, 499/1020, 16015/32736, 12023/24576,
-  16023/32752, 14027/28672, 16027/32760, 15029/30720, 16029/32764,
-  7765/15872, 8015/16383, 7953/16256, 16025/32752, 137/280,
-  16031/32764, 3883/7936, 15031/30720, 14029/28672, 3977/8128,
-  1143/2336, 12025/24576, 16033/32767, 5261/10752, 15971/32640,
-  8009/16368, 8013/16376, 229/468, 15533/31744, 1879/3840,
-  15909/32512, 7015/14336, 16003/32704, 1973/4032, 1331/2720,
-  16019/32736, 6013/12288, 16027/32752, 16031/32760, 16033/32764,
-  8017/16383, 7767/15872, 5011/10240, 7955/16256, 4001/8176,
-  14031/28672, 16035/32767, 2255/4608, 15973/32640, 1335/2728,
-  4007/8188, 15535/31744, 7517/15360, 15911/32512, 16005/32704,
-  877/1792, 7987/16320, 16021/32736, 16029/32752, 16033/32760,
-  16035/32764, 971/1984, 1989/4064, 8003/16352, 3007/6144, 2291/4681,
-  15787/32256, 1065/2176, 8011/16368, 14033/28672, 8015/16376,
-  8017/16380, 4009/8191, 15537/31744, 15913/32512, 16007/32704,
-  1253/2560, 3947/8064, 1997/4080, 5341/10912, 12029/24576, 697/1424,
-  7017/14336, 1069/2184, 16037/32764, 2673/5461, 7769/15872,
-  7957/16256, 2001/4088, 15037/30720, 16039/32767, 5263/10752,
-  15977/32640, 2003/4092, 15539/31744, 15915/32512, 2287/4672,
-  7519/15360, 7895/16128, 2663/5440, 16025/32736, 16033/32752,
-  2291/4680, 16039/32764, 3509/7168, 3885/7936, 3979/8128, 8005/16352,
-  12031/24576, 16041/32767, 5013/10240, 15791/32256, 15979/32640,
-  2671/5456, 8017/16376, 891/1820, 14037/28672, 15541/31744,
-  15917/32512, 16011/32704, 47/96, 16035/32752, 16039/32760,
-  16041/32764, 8021/16383, 4003/8176, 7959/16256, 7771/15872,
-  7019/14336, 16043/32767, 4007/8184, 5327/10880, 15793/32256,
-  15041/30720, 4009/8188, 401/819, 16013/32704, 15919/32512,
-  15543/31744, 14039/28672, 5343/10912, 7991/16320, 7897/16128,
-  2507/5120, 16037/32752, 5347/10920, 16043/32764, 6017/12288,
-  8007/16352, 995/2032, 1943/3968, 16045/32767, 8015/16368,
-  15983/32640, 1755/3584, 8019/16376, 15043/30720, 617/1260,
-  4011/8191, 16015/32704, 15921/32512, 15545/31744, 12035/24576,
-  16031/32736, 333/680, 3949/8064, 16039/32752, 14041/28672,
-  16043/32760, 3761/7680, 16045/32764, 8023/16383, 143/292,
-  7961/16256, 7773/15872, 16047/32767, 167/341, 16017/32704,
-  15923/32512, 15547/31744, 16033/32736, 7993/16320, 2633/5376,
-  16041/32752, 3209/6552, 16047/32764, 7523/15360, 14043/28672,
-  12037/24576, 8009/16352, 3981/8128, 16049/32767, 3887/7936,
-  8017/16368, 5329/10880, 2257/4608, 8021/16376, 8023/16380,
-  15047/30720, 3511/7168, 16019/32704, 15925/32512, 15549/31744,
-  6019/12288, 5345/10912, 3997/8160, 1975/4032, 16043/32752,
-  1783/3640, 16049/32764, 2675/5461, 627/1280, 4005/8176, 7963/16256,
-  14045/28672, 2293/4681, 7775/15872, 4009/8184, 15989/32640,
-  5267/10752, 4011/8188, 15049/30720, 16021/32704, 15927/32512,
-  7023/14336, 15551/31744, 16037/32736, 533/1088, 7901/16128,
-  16045/32752, 16049/32760, 16051/32764, 1505/3072, 8011/16352,
-  1991/4064, 16053/32767, 243/496, 15991/32640, 14047/28672,
-  8023/16376, 15803/32256, 535/1092, 4013/8191, 2289/4672, 5017/10240,
-  15929/32512, 12041/24576, 16039/32736, 15553/31744, 1999/4080,
-  16047/32752, 439/896, 2293/4680, 16053/32764, 8027/16383, 2003/4088,
-  7965/16256, 3763/7680, 16055/32767, 2005/4092, 5331/10880,
-  7777/15872, 1003/2047, 16025/32704, 15931/32512, 15053/30720,
-  5347/10912, 7997/16320, 15555/31744, 16049/32752, 1129/2304,
-  5351/10920, 16055/32764, 7025/14336, 12043/24576, 8013/16352,
-  3983/8128, 16057/32767, 2509/5120, 8021/16368, 3199/6528, 3889/7936,
-  8025/16376, 5269/10752, 8027/16380, 14051/28672, 16027/32704,
-  15933/32512, 3011/6144, 16043/32736, 1333/2720, 15557/31744,
-  16051/32752, 247/504, 16057/32764, 8029/16383, 4007/8176, 3513/7168,
-  7967/16256, 16059/32767, 1337/2728, 941/1920, 4013/8188, 7779/15872,
-  223/455, 16029/32704, 15935/32512, 14053/28672, 16045/32736,
-  7999/16320, 5019/10240, 16053/32752, 15559/31744, 16057/32760,
-  2635/5376, 16059/32764, 6023/12288, 1145/2336, 249/508, 16061/32767,
-  8023/16368, 7027/14336, 5333/10880, 349/712, 7529/15360, 1147/2340,
-  1945/3968, 4015/8191, 16031/32704, 15937/32512, 12047/24576,
-  5349/10912, 25/51, 12049/24576, 8017/16352, 2295/4681, 3985/8128,
-  2675/5456, 16003/32640, 8029/16376, 2677/5460, 3891/7936,
-  7531/15360, 7029/14336, 16035/32704, 15941/32512, 6025/12288,
-  16051/32736, 4001/8160, 16059/32752, 16063/32760, 16065/32764,
-  8033/16383, 659/1344, 15565/31744, 5021/10240, 4009/8176,
-  14059/28672, 16067/32767, 7971/16256, 4013/8184, 1067/2176,
-  4015/8188, 7783/15872, 1883/3840, 2291/4672, 15943/32512, 3515/7168,
-  5351/10912, 8003/16320, 16061/32752, 51/104, 16067/32764,
-  7909/16128, 15567/31744, 3013/6144, 8019/16352, 16069/32767,
-  1993/4064, 8027/16368, 14061/28672, 16007/32640, 8031/16376,
-  8033/16380, 4017/8191, 5273/10752, 973/1984, 16039/32704, 2511/5120,
-  15945/32512, 12053/24576, 16055/32736, 667/1360, 16063/32752,
-  7031/14336, 16067/32760, 16069/32764, 8035/16383, 565/1152,
-  15569/31744, 2005/4088, 15067/30720, 16071/32767, 7973/16256,
-  669/1364, 16009/32640, 7785/15872, 16041/32704, 3767/7680,
-  15947/32512, 16057/32736, 1601/3264, 16065/32752, 16069/32760,
-  16071/32764, 879/1792, 15571/31744, 12055/24576, 8021/16352,
-  16073/32767, 3987/8128, 5023/10240, 259/528, 5337/10880, 8033/16376,
-  1607/3276, 15823/32256, 14065/28672, 3893/7936, 16043/32704,
-  15949/32512, 1507/3072, 5353/10912, 4003/8160, 16067/32752,
-  5357/10920, 16073/32764, 2679/5461, 989/2016, 15573/31744, 573/1168,
-  7033/14336, 16075/32767, 7975/16256, 365/744, 15071/30720,
-  16013/32640, 4017/8188, 287/585, 5275/10752, 7787/15872,
-  16045/32704, 14067/28672, 15951/32512, 16061/32736, 157/320,
-  16069/32752, 16073/32760, 16075/32764, 7913/16128, 6029/12288,
-  8023/16352, 15575/31744, 16077/32767, 997/2032, 2677/5456,
-  3517/7168, 3203/6528, 8035/16376, 15073/30720, 893/1820, 4019/8191,
-  2261/4608, 16047/32704, 1947/3968, 15953/32512, 12059/24576,
-  16063/32736, 1001/2040, 16071/32752, 14069/28672, 3215/6552,
-  7537/15360, 16077/32764, 8039/16383, 1319/2688, 1003/2044,
-  15577/31744, 2297/4681, 7977/16256, 16049/32704, 7789/15872,
-  15955/32512, 5355/10912, 8009/16320, 16073/32752, 5359/10920,
-  16079/32764, 3769/7680, 14071/28672, 7915/16128, 12061/24576,
-  8025/16352, 16081/32767, 15579/31744, 3989/8128, 8033/16368,
-  16019/32640, 8037/16376, 8039/16380, 15077/30720, 1759/3584,
-  2293/4672, 3895/7936, 15957/32512, 6031/12288, 16067/32736, 267/544,
-  16075/32752, 2297/4680, 16081/32764, 187/381, 2513/5120, 1979/4032,
-  4013/8176, 14073/28672, 16083/32767, 15581/31744, 7979/16256,
-  1339/2728, 16021/32640, 4019/8188, 15079/30720, 15833/32256,
-  16053/32704, 7037/14336, 7791/15872, 15959/32512, 16069/32736,
-  8011/16320, 699/1424, 1237/2520, 16083/32764, 377/768, 8027/16352,
-  16085/32767, 1995/4064, 15583/31744, 8035/16368, 14075/28672,
-  5341/10880, 8039/16376, 8041/16380, 4021/8191, 15835/32256,
-  5027/10240, 16055/32704, 12065/24576, 15961/32512, 487/992,
-  2003/4080, 16079/32752, 3519/7168, 1787/3640, 16085/32764,
-  2681/5461, 3959/8064, 2007/4088, 7541/15360, 16087/32767,
-  7981/16256, 2009/4092, 15585/31744, 3205/6528, 1005/2047,
-  5279/10752, 16057/32704, 15083/30720, 15963/32512, 16073/32736,
-  7793/15872, 2671/5440, 16081/32752, 3217/6552, 16087/32764,
-  7039/14336, 12067/24576, 7919/16128, 1147/2336, 519/1057, 1257/2560,
-  3991/8128, 2679/5456, 15587/31744, 16027/32640, 8041/16376, 383/780,
-  14079/28672, 15839/32256, 16059/32704, 3017/6144, 15965/32512,
-  16075/32736, 3897/7936, 4007/8160, 16083/32752, 16087/32760,
-  16089/32764, 8045/16383, 55/112, 16091/32767, 4019/8184, 7983/16256,
-  7543/15360, 4021/8188, 5343/10880, 15589/31744, 2011/4095,
-  16061/32704, 2263/4608, 14081/28672, 5359/10912, 15967/32512,
-  5029/10240, 16085/32752, 1603/3264, 7795/15872, 5363/10920,
-  16091/32764, 6035/12288, 8031/16352, 7921/16128, 2299/4681,
-  7041/14336, 8039/16368, 499/1016, 8043/16376, 943/1920, 1609/3276,
-  15591/31744, 4023/8191, 16063/32704, 5281/10752, 12071/24576,
-  16079/32736, 15969/32512, 14083/28672, 16087/32752, 167/340,
-  16091/32760, 15089/30720, 16093/32764, 1949/3968, 8047/16383,
-  251/511, 16081/32736, 15971/32512, 16089/32752, 8017/16320,
-  2299/4680, 16095/32764, 7797/15872, 15091/30720, 14085/28672,
-  12073/24576, 8033/16352, 16097/32767, 2641/5376, 731/1488,
-  3993/8128, 8045/16376, 1069/2176, 619/1260, 15595/31744, 3773/7680,
-  7043/14336, 16067/32704, 15847/32256, 6037/12288, 5361/10912,
-  15973/32512, 16091/32752, 4009/8160, 1073/2184, 16097/32764,
-  2683/5461, 3899/7936, 5031/10240, 14087/28672, 4017/8176,
-  16099/32767, 283/576, 4021/8184, 7987/16256, 4023/8188, 16037/32640,
-  15597/31744, 7547/15360, 16069/32704, 1761/3584, 16085/32736,
-  15975/32512, 16093/32752, 2673/5440, 16097/32760, 16099/32764,
-  7799/15872, 3019/6144, 8035/16352, 16101/32767, 7925/16128,
-  14089/28672, 2681/5456, 1997/4064, 8047/16376, 16039/32640,
-  2683/5460, 4025/8191, 15599/31744, 629/1280, 16071/32704,
-  15851/32256, 12077/24576, 16087/32736, 15977/32512, 7045/14336,
-  16095/32752, 401/816, 16099/32760, 16101/32764, 8051/16383,
-  975/1984, 287/584, 15097/30720, 16103/32767, 1321/2688, 2011/4092,
-  7989/16256, 15601/31744, 16073/32704, 7549/15360, 15853/32256,
-  173/352, 15979/32512, 16097/32752, 8021/16320, 1789/3640,
-  16103/32764, 3523/7168, 7801/15872, 12079/24576, 8037/16352,
-  16105/32767, 5033/10240, 7927/16128, 8045/16368, 3995/8128,
-  8049/16376, 16043/32640, 8051/16380, 14093/28672, 15603/31744,
-  16075/32704, 755/1536, 16091/32736, 15981/32512, 16099/32752,
-  1337/2720, 16103/32760, 16105/32764, 8053/16383, 3901/7936,
-  7047/14336, 4019/8176, 2301/4681, 991/2016, 1341/2728, 15101/30720,
-  7991/16256, 175/356, 3209/6528, 671/1365, 15605/31744, 16077/32704,
-  14095/28672, 15857/32256, 1463/2976, 2517/5120, 15983/32512,
-  16101/32752, 8023/16320, 3221/6552, 16107/32764, 6041/12288,
-  7803/15872, 8039/16352, 16109/32767, 881/1792, 8047/16368, 999/2032,
-  8051/16376, 15103/30720, 5349/10880, 8053/16380, 4027/8191,
-  15607/31744, 2297/4672, 12083/24576, 15859/32256, 5365/10912,
-  14097/28672, 15985/32512, 16103/32752, 59/120, 16109/32764,
-  2685/5461, 1005/2044, 1951/3968, 16111/32767, 503/1023, 16081/32704,
-  15609/31744, 16097/32736, 5287/10752, 16105/32752, 15987/32512,
-  16109/32760, 535/1088, 16111/32764, 7553/15360, 14099/28672,
-  12085/24576, 8041/16352, 16113/32767, 7805/15872, 2683/5456,
-  1133/2304, 8053/16376, 3997/8128, 179/364, 16051/32640, 15107/30720,
-  3525/7168, 16083/32704, 15611/31744, 6043/12288, 16099/32736,
-  15863/32256, 16107/32752, 15989/32512, 16111/32760, 4013/8160,
-  16113/32764, 8057/16383, 1259/2560, 14101/28672, 4021/8176,
-  16115/32767, 3903/7936, 4025/8184, 661/1344, 4027/8188, 7995/16256,
-  15109/30720, 16085/32704, 7051/14336, 15613/31744, 5367/10912,
-  15865/32256, 181/368, 15991/32512, 5371/10920, 8027/16320,
-  16115/32764, 1511/3072, 1149/2336, 16117/32767, 7807/15872,
-  14103/28672, 8051/16368, 7933/16128, 8055/16376, 1999/4064,
-  1151/2340, 3211/6528, 4029/8191, 5037/10240, 16087/32704,
-  12089/24576, 15615/31744, 16103/32736, 1763/3584, 16111/32752,
-  15993/32512, 3223/6552, 669/1360, 16117/32764, 8059/16383,
-  1889/3840, 2011/4088, 16119/32767, 61/124, 1007/2047, 16089/32704,
-  15113/30720, 16105/32736, 15617/31744, 16113/32752, 2267/4608,
-  16117/32760, 15995/32512, 16119/32764, 8029/16320, 7053/14336,
-  12091/24576, 8045/16352, 2303/4681, 2519/5120, 8053/16368,
-  7809/15872, 8057/16376, 2645/5376, 8059/16380, 3999/8128,
-  14107/28672, 16091/32704, 3023/6144, 5369/10912, 15619/31744,
-  16115/32752, 15871/32256, 1791/3640, 15997/32512, 16121/32764,
-  803/1632, 2687/5461, 3527/7168, 4023/8176, 16123/32767, 3779/7680,
-  4027/8184, 3905/7936, 4029/8188, 31/63, 1985/4032, 3907/7936,
-  3781/7680, 16101/32704, 3529/7168, 16117/32736, 16125/32752,
-  16129/32760, 16131/32764, 1607/3264, 16007/32512, 15881/32256,
-  15629/31744, 3025/6144, 16133/32767, 8051/16352, 14117/28672,
-  8059/16368, 8063/16376, 1613/3276, 4033/8191, 2001/4064, 2647/5376,
-  7815/15872, 2521/5120, 16103/32704, 12101/24576, 5373/10912,
-  7059/14336, 16127/32752, 5377/10920, 16133/32764, 2689/5461,
-  2009/4080, 16009/32512, 2269/4608, 15631/31744, 15127/30720,
-  2305/4681, 2013/4088, 65/132, 3971/8064, 977/1984, 16105/32704,
-  1891/3840, 16121/32736, 16129/32752, 1241/2520, 16135/32764,
-  2679/5440, 16011/32512, 1765/3584, 15633/31744, 12103/24576,
-  16137/32767, 8053/16352, 5043/10240, 2687/5456, 8065/16376,
-  2689/5460, 3215/6528, 4003/8128, 7943/16128, 14121/28672,
-  7817/15872, 2301/4672, 1513/3072, 16123/32736, 16131/32752, 461/936,
-  16137/32764, 8069/16383, 4019/8160, 16013/32512, 15887/32256,
-  15635/31744, 7061/14336, 16139/32767, 4027/8176, 15131/30720,
-  4031/8184, 4033/8188, 2017/4095, 8007/16256, 331/672, 3909/7936,
-  16109/32704, 14123/28672, 5375/10912, 1261/2560, 16133/32752,
-  1793/3640, 16139/32764, 8039/16320, 16015/32512, 15889/32256,
-  6053/12288, 15637/31744, 16141/32767, 8055/16352, 3531/7168,
-  733/1488, 15133/30720, 8067/16376, 8069/16380, 4035/8191,
-  16079/32640, 1001/2032, 1135/2304, 7819/15872, 16111/32704,
-  12107/24576, 16127/32736, 14125/28672, 16135/32752, 7567/15360,
-  16139/32760, 16141/32764, 8071/16383, 67/136, 16017/32512,
-  5297/10752, 15639/31744, 16143/32767, 1007/2044, 3973/8064,
-  1955/3968, 16113/32704, 16129/32736, 16137/32752, 16141/32760,
-  16143/32764, 473/960, 16019/32512, 14127/28672, 15893/32256,
-  12109/24576, 16145/32767, 1151/2336, 15641/31744, 8065/16368,
-  8069/16376, 1153/2340, 5361/10880, 15137/30720, 4005/8128, 883/1792,
-  16115/32704, 7821/15872, 6055/12288, 5377/10912, 16139/32752,
-  5381/10920, 16145/32764, 2691/5461, 4021/8160, 16021/32512,
-  2523/5120, 15895/32256, 14129/28672, 16147/32767, 4029/8176,
-  15643/31744, 4033/8184, 4035/8188, 3217/6528, 8011/16256,
-  15139/30720, 1987/4032, 16117/32704, 7065/14336, 3911/7936,
-  16133/32736, 16141/32752, 3229/6552, 16147/32764, 2681/5440,
-  16023/32512, 757/1536, 2307/4681, 8059/16352, 15645/31744,
-  14131/28672, 2689/5456, 8071/16376, 69/140, 4037/8191, 16087/32640,
-  2003/4064, 7949/16128, 5047/10240, 16119/32704, 12113/24576,
-  7823/15872, 16135/32736, 3533/7168, 16143/32752, 16147/32760,
-  16149/32764, 8075/16383, 2011/4080, 16025/32512, 15899/32256,
-  7571/15360, 521/1057, 2015/4088, 15647/31744, 2017/4092, 1009/2047,
-  8013/16256, 1325/2688, 15143/30720, 2303/4672, 489/992, 16145/32752,
-  769/1560, 16151/32764, 1609/3264, 7067/14336, 16027/32512,
-  12115/24576, 15901/32256, 16153/32767, 8061/16352, 631/1280,
-  8069/16368, 15649/31744, 351/712, 1615/3276, 16091/32640, 4007/8128,
-  14135/28672, 7951/16128, 16123/32704, 3029/6144, 16139/32736,
-  7825/15872, 16147/32752, 16151/32760, 16153/32764, 8077/16383,
-  1341/2720, 16029/32512, 1767/3584, 16155/32767, 4031/8176,
-  7573/15360, 1345/2728, 15651/31744, 4037/8188, 673/1365,
-  16093/32640, 8015/16256, 71/144, 16125/32704, 14137/28672,
-  16141/32736, 5049/10240, 16149/32752, 3913/7936, 16153/32760,
-  16155/32764, 8047/16320, 16031/32512, 6059/12288, 15905/32256,
-  107/217, 8063/16352, 7069/14336, 8071/16368, 3787/7680, 8075/16376,
-  15653/31744, 8077/16380, 4039/8191, 1073/2176, 501/1016, 2651/5376,
-  16127/32704, 12119/24576, 5381/10912, 14139/28672, 16151/32752,
-  15149/30720, 359/728, 7827/15872, 16157/32764, 2693/5461, 503/1020,
-  16033/32512, 15907/32256, 16159/32767, 3977/8064, 16129/32704,
-  16145/32736, 16153/32752, 16157/32760, 16159/32764, 1957/3968,
-  15151/30720, 2683/5440, 14141/28672, 16035/32512, 12121/24576,
-  16161/32767, 5303/10752, 8065/16352, 2691/5456, 8077/16376,
-  2693/5460, 15657/31744, 947/1920, 4009/8128, 7071/14336, 7955/16128,
-  16131/32704, 6061/12288, 16147/32736, 16155/32752, 1243/2520,
-  16161/32764, 8081/16383, 7829/15872, 805/1632, 5051/10240,
-  16037/32512, 14143/28672, 2309/4681, 2273/4608, 4033/8176, 367/744,
-  4039/8188, 15659/31744, 5367/10880, 7577/15360, 8019/16256, 221/448,
-  5383/10912, 16157/32752, 5387/10920, 16163/32764, 8051/16320,
-  3915/7936, 16039/32512, 3031/6144, 16165/32767, 8067/16352,
-  15913/32256, 14145/28672, 8075/16368, 8079/16376, 8081/16380,
-  4041/8191, 16103/32640, 15661/31744, 2005/4064, 1263/2560,
-  2305/4672, 7957/16128, 12125/24576, 521/1056, 7073/14336,
-  16159/32752, 2309/4680, 16165/32764, 8083/16383, 671/1360,
-  7831/15872, 16041/32512, 15157/30720, 16167/32767, 2017/4088,
-  5305/10752, 673/1364, 3221/6528, 15663/31744, 8021/16256,
-  7579/15360, 16137/32704, 3979/8064, 16153/32736, 16161/32752,
-  3233/6552, 16167/32764, 3537/7168, 8053/16320, 979/1984,
-  16043/32512, 12127/24576, 16169/32767, 8069/16352, 5053/10240,
-  15917/32256, 8077/16368, 8081/16376, 8083/16380, 5369/10880,
-  14149/28672, 15665/31744, 4011/8128, 16139/32704, 379/768,
-  5385/10912, 16163/32752, 5389/10920, 16169/32764, 2695/5461,
-  4027/8160, 16045/32512, 7833/15872, 7075/14336, 16171/32767,
-  4035/8176, 15919/32256, 15161/30720, 4039/8184, 4041/8188,
-  2021/4095, 16109/32640, 8023/16256, 15667/31744, 14151/28672,
-  16141/32704, 995/2016, 16157/32736, 2527/5120, 16165/32752,
-  16169/32760, 16171/32764, 537/1088, 6065/12288, 16047/32512,
-  3917/7936, 16173/32767, 1153/2336, 1769/3584, 2693/5456,
-  15163/30720, 8083/16376, 77/156, 4043/8191, 16111/32640, 1003/2032,
-  15669/31744, 16143/32704, 12131/24576, 7961/16128, 1469/2976,
-  14153/28672, 16167/32752, 3791/7680, 16171/32760, 16173/32764,
-  8087/16383, 1007/2040, 16049/32512, 7835/15872, 16175/32767,
-  1009/2044, 15923/32256, 505/1023, 8025/16256, 15671/31744,
-  16145/32704, 1327/2688, 5387/10912, 703/1424, 1797/3640,
-  16175/32764, 7583/15360, 14155/28672, 8057/16320, 12133/24576,
-  16051/32512, 2311/4681, 1959/3968, 8073/16352, 2275/4608,
-  8081/16368, 8085/16376, 8087/16380, 15167/30720, 3223/6528,
-  3539/7168, 4013/8128, 15673/31744, 16147/32704, 6067/12288,
-  7963/16128, 16163/32736, 16171/32752, 3235/6552, 16177/32764,
-  8089/16383, 79/160, 16053/32512, 14157/28672, 16179/32767,
-  4037/8176, 7837/15872, 1347/2728, 5309/10752, 4043/8188,
-  16117/32640, 15169/30720, 8027/16256, 7079/14336, 2307/4672,
-  15675/31744, 16165/32736, 1991/4032, 16173/32752, 2311/4680,
-  16179/32764, 8059/16320, 1517/3072, 16055/32512, 16181/32767,
-  8075/16352, 3919/7936, 14159/28672, 8083/16368, 15929/32256,
-  8087/16376, 8089/16380, 4045/8191, 5373/10880, 5057/10240,
-  2007/4064, 16151/32704, 12137/24576, 15677/31744, 5389/10912,
-  885/1792, 16175/32752, 5393/10920, 16181/32764, 2697/5461, 403/816,
-  16057/32512, 3793/7680, 16183/32767, 2019/4088, 7839/15872,
-  2021/4092, 15931/32256, 1011/2047, 16121/32640, 8029/16256,
-  15173/30720, 16153/32704, 15679/31744, 16169/32736, 569/1152,
-  16177/32752, 16181/32760, 16183/32764, 7081/14336, 2687/5440,
-  12139/24576, 16059/32512, 16185/32767, 2529/5120, 8077/16352,
-  245/496, 8089/16376, 5311/10752, 899/1820, 16123/32640, 14163/28672,
-  4015/8128, 16155/32704, 3035/6144, 16171/32736, 15681/31744,
-  16179/32752, 7967/16128, 16183/32760, 16185/32764, 8093/16383,
-  4031/8160, 3541/7168, 16061/32512, 16187/32767, 577/1168, 1897/3840,
-  4043/8184, 7841/15872, 4045/8188, 15935/32256, 289/585, 1075/2176,
-  8031/16256, 14165/28672, 16157/32704, 5059/10240, 5391/10912,
-  15683/31744, 16181/32752, 83/168, 16187/32764, 8063/16320,
-  6071/12288, 16063/32512, 16189/32767, 8079/16352, 7083/14336,
-  8087/16368, 7589/15360, 8091/16376, 3921/7936, 8093/16380,
-  15937/32256, 4047/8191, 16127/32640, 251/508, 16159/32704,
-  12143/24576, 16175/32736, 14167/28672, 16183/32752, 15179/30720,
-  16187/32760, 15685/31744, 16189/32764, 7969/16128, 8095/16383,
-  16177/32736, 16185/32752, 16189/32760, 16191/32764, 3985/8064,
-  15687/31744, 15181/30720, 14169/28672, 1613/3264, 12145/24576,
-  16193/32767, 16067/32512, 8081/16352, 8089/16368, 8093/16376,
-  1619/3276, 15941/32256, 1961/3968, 7591/15360, 5377/10880,
-  7085/14336, 4017/8128, 2309/4672, 6073/12288, 5393/10912,
-  16187/32752, 257/520, 16193/32764, 2699/5461, 2657/5376,
-  15689/31744, 5061/10240, 4033/8160, 14171/28672, 16195/32767,
-  16069/32512, 4041/8176, 4045/8184, 4047/8188, 15943/32256,
-  7845/15872, 949/1920, 8035/16256, 3543/7168, 16165/32704, 1471/2976,
-  16189/32752, 16193/32760, 16195/32764, 1993/4032, 15691/31744,
-  2689/5440, 3037/6144, 16197/32767, 16071/32512, 8083/16352,
-  14173/28672, 87/176, 8095/16376, 2699/5460, 4049/8191, 5315/10752,
-  3923/7936, 3227/6528, 2531/5120, 2009/4064, 16167/32704,
-  12149/24576, 16183/32736, 7087/14336, 16191/32752, 3239/6552,
-  16197/32764, 8099/16383, 1139/2304, 15693/31744, 2017/4080,
-  15187/30720, 16199/32767, 16073/32512, 2021/4088, 2023/4092,
-  15947/32256, 7847/15872, 5379/10880, 3797/7680, 8037/16256,
-  16169/32704, 5395/10912, 16193/32752, 5399/10920, 16199/32764,
-  443/896, 8069/16320, 15695/31744, 12151/24576, 16201/32767,
-  16075/32512, 5063/10240, 1155/2336, 8093/16368, 8097/16376, 89/180,
-  15949/32256, 14177/28672, 16139/32640, 981/1984, 4019/8128,
-  16171/32704, 1519/3072, 16187/32736, 16195/32752, 16199/32760,
-  16201/32764, 8101/16383, 7975/16128, 269/544, 15697/31744,
-  7089/14336, 16203/32767, 16077/32512, 4043/8176, 15191/30720,
-  1349/2728, 4049/8188, 45/91, 5317/10752, 16141/32640, 7849/15872,
-  14179/28672, 8039/16256, 16173/32704, 633/1280, 16189/32736,
-  16197/32752, 16201/32760, 16203/32764, 997/2016, 8071/16320,
-  6077/12288, 15699/31744, 2315/4681, 16079/32512, 8087/16352,
-  3545/7168, 8095/16368, 15193/30720, 91/184, 8101/16380, 4051/8191,
-  2279/4608, 5381/10880, 3925/7936, 1005/2032, 16175/32704,
-  12155/24576, 5397/10912, 14181/28672, 16199/32752, 7597/15360,
-  5401/10920, 16205/32764, 2701/5461, 2659/5376, 1009/2040,
-  15701/31744, 16207/32767, 16081/32512, 1011/2044, 15955/32256,
-  3229/6528, 7851/15872, 8041/16256, 2311/4672, 16193/32736,
-  16201/32752, 463/936, 16207/32764, 3799/7680, 14183/28672,
-  3989/8064, 2691/5440, 12157/24576, 16209/32767, 15703/31744,
-  16083/32512, 8089/16352, 2699/5456, 8101/16376, 2701/5460,
-  15197/30720, 1773/3584, 16147/32640, 1963/3968, 4021/8128,
-  16179/32704, 6079/12288, 16195/32736, 16203/32752, 16207/32760,
-  16209/32764, 8105/16383, 2533/5120, 7979/16128, 4037/8160,
-  14185/28672, 16211/32767, 15705/31744, 16085/32512, 4045/8176,
-  4049/8184, 4051/8188, 15199/30720, 15959/32256, 5383/10880,
-  7093/14336, 7853/15872, 8043/16256, 16181/32704, 5399/10912,
-  16205/32752, 1801/3640, 16211/32764, 95/192, 523/1057, 8091/16352,
-  16087/32512, 15707/31744, 14187/28672, 8099/16368, 8103/16376,
-  1621/3276, 4053/8191, 16151/32640, 15961/32256, 5067/10240,
-  12161/24576, 16183/32704, 2011/4064, 3927/7936, 16199/32736,
-  3547/7168, 16207/32752, 1247/2520, 16213/32764, 8107/16383,
-  673/1360, 7981/16128, 7601/15360, 16215/32767, 289/584, 16089/32512,
-  15709/31744, 675/1364, 1013/2047, 16153/32640, 5321/10752,
-  15203/30720, 16185/32704, 8045/16256, 7855/15872, 16201/32736,
-  16209/32752, 16213/32760, 16215/32764, 7095/14336, 12163/24576,
-  8077/16320, 3991/8064, 16217/32767, 1267/2560, 8093/16352,
-  16091/32512, 15711/31744, 8101/16368, 8105/16376, 8107/16380,
-  14191/28672, 1077/2176, 15965/32256, 3041/6144, 16187/32704,
-  4023/8128, 491/992, 16211/32752, 1081/2184, 16217/32764, 2703/5461,
-  4039/8160, 887/1792, 2317/4681, 4047/8176, 16093/32512, 7603/15360,
-  4051/8184, 15713/31744, 4053/8188, 2027/4095, 16157/32640,
-  2281/4608, 14193/28672, 16189/32704, 8047/16256, 5069/10240,
-  16205/32736, 7857/15872, 16213/32752, 16217/32760, 16219/32764,
-  6083/12288, 2693/5440, 499/1008, 16221/32767, 8095/16352,
-  7097/14336, 16095/32512, 2701/5456, 1901/3840, 8107/16376,
-  15715/31744, 901/1820, 4055/8191, 16159/32640, 5323/10752,
-  12167/24576, 2313/4672, 503/1016, 16207/32736, 14195/28672,
-  705/1424, 15209/30720, 2317/4680, 3929/7936, 16221/32764,
-  8111/16383, 101/204, 7985/16128, 16223/32767, 253/511, 5387/10880,
-  15971/32256, 16193/32704, 8049/16256, 5403/10912, 16217/32752,
-  5407/10920, 16223/32764, 7859/15872, 15211/30720, 14197/28672,
-  12169/24576, 8081/16320, 16225/32767, 1331/2688, 8097/16352,
-  16099/32512, 8105/16368, 8109/16376, 8111/16380, 15719/31744,
-  3803/7680, 7099/14336, 16163/32640, 15973/32256, 6085/12288,
-  16195/32704, 4025/8128, 16211/32736, 16219/32752, 16223/32760,
-  16225/32764, 8113/16383, 1965/3968, 5071/10240, 1347/2720,
-  14199/28672, 16227/32767, 1141/2304, 4049/8176, 16101/32512,
-  1351/2728, 4055/8188, 15721/31744, 7607/15360, 3233/6528, 1775/3584,
-  16197/32704, 8051/16256, 523/1056, 16221/32752, 3245/6552,
-  16227/32764, 7861/15872, 3043/6144, 8083/16320, 16229/32767,
-  1997/4032, 1157/2336, 14201/28672, 16103/32512, 737/1488,
-  8111/16376, 1159/2340, 4057/8191, 15723/31744, 317/640, 15977/32256,
-  12173/24576, 16199/32704, 2013/4064, 5405/10912, 7101/14336,
-  16223/32752, 1803/3640, 16229/32764, 2705/5461, 3931/7936,
-  2021/4080, 15217/30720, 16231/32767, 2663/5376, 2025/4088,
-  16105/32512, 2027/4092, 15725/31744, 16169/32640, 7609/15360,
-  15979/32256, 16201/32704, 8053/16256, 16217/32736, 16225/32752,
-  16229/32760, 16231/32764, 3551/7168, 7863/15872, 12175/24576,
-  539/1088, 2319/4681, 5073/10240, 3995/8064, 8101/16352, 16107/32512,
-  2703/5456, 8113/16376, 541/1092, 14205/28672, 15727/31744,
-  16171/32640, 761/1536, 16203/32704, 4027/8128, 16219/32736,
-  16227/32752, 16231/32760, 16233/32764, 8117/16383, 983/1984,
-  4043/8160, 7103/14336, 16235/32767, 7991/16128, 4051/8176,
-  15221/30720, 16109/32512, 4055/8184, 4057/8188, 2029/4095,
-  15729/31744, 5391/10880, 14207/28672, 15983/32256, 2315/4672,
-  2537/5120, 8055/16256, 5407/10912, 16229/32752, 773/1560,
-  16235/32764, 6089/12288, 7865/15872, 8087/16320, 16237/32767,
-  111/224, 8111/16368, 16111/32512, 15223/30720, 8115/16376,
-  8117/16380, 4059/8191, 3235/6528, 15731/31744, 12179/24576,
-  16207/32704, 15985/32256, 14209/28672, 16223/32736, 1007/2032,
-  16231/32752, 1903/3840, 3247/6552, 16237/32764, 8119/16383, 337/680,
-  3933/7936, 16239/32767, 1013/2044, 7993/16128, 169/341, 16177/32640,
-  15733/31744, 16209/32704, 5329/10752, 1475/2976, 8057/16256,
-  16233/32752, 1249/2520, 16239/32764, 7613/15360, 14211/28672,
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-  571/1152, 8113/16368, 16115/32512, 8117/16376, 8119/16380,
-  15227/30720, 3553/7168, 5393/10880, 15735/31744, 6091/12288,
-  16211/32704, 15989/32256, 5409/10912, 4029/8128, 16235/32752,
-  5413/10920, 16241/32764, 2707/5461, 1269/2560, 14213/28672,
-  809/1632, 16243/32767, 1967/3968, 579/1168, 2665/5376, 4057/8184,
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-  16245/32767, 7869/15872, 14215/28672, 8107/16352, 1999/4032,
-  2705/5456, 16119/32512, 353/712, 2707/5460, 4061/8191, 5077/10240,
-  16183/32640, 12185/24576, 15739/31744, 16215/32704, 1777/3584,
-  16231/32736, 2015/4064, 16239/32752, 16243/32760, 16245/32764,
-  8123/16383, 119/240, 2321/4681, 2027/4088, 3935/7936, 2029/4092,
-  7997/16128, 1015/2047, 1079/2176, 15233/30720, 16217/32704,
-  15741/31744, 5411/10912, 2285/4608, 16241/32752, 8061/16256,
-  361/728, 16247/32764, 7109/14336, 12187/24576, 8093/16320,
-  16249/32767, 2539/5120, 8109/16352, 7871/15872, 8117/16368,
-  1333/2688, 8121/16376, 16123/32512, 8123/16380, 14219/28672,
-  16187/32640, 3047/6144, 2317/4672, 15743/31744, 16235/32736,
-  15997/32256, 16243/32752, 4031/8128, 2321/4680, 16249/32764,
-  8125/16383, 3555/7168, 1349/2720, 16251/32767, 3809/7680, 4055/8176,
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-  16221/32704, 5079/10240, 16237/32736, 15745/31744, 16245/32752,
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-  1619/3264, 16253/32767, 7111/14336, 8111/16352, 7619/15360,
-  8119/16368, 7873/15872, 8123/16376, 125/252, 4063/8191, 5397/10880,
-  12191/24576, 16223/32704, 14223/28672, 5413/10912, 15239/30720,
-  16247/32752, 15747/31744, 5417/10920, 16001/32256, 16253/32764,
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-  14225/28672, 12193/24576, 16257/32767, 2699/5440, 1159/2336,
-  2707/5456, 8125/16376, 129/260, 16131/32512, 4001/8064, 7875/15872,
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-  4033/8128, 5335/10752, 15751/31744, 5081/10240, 14227/28672,
-  16259/32767, 4049/8160, 4057/8176, 131/264, 4063/8188, 16133/32512,
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-  16229/32704, 5415/10912, 16253/32752, 5419/10920, 16259/32764,
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-  8099/16320, 14229/28672, 8115/16352, 8123/16368, 8127/16376,
-  8129/16380, 4065/8191, 16135/32512, 667/1344, 7877/15872, 2541/5120,
-  16199/32640, 12197/24576, 16231/32704, 7115/14336, 1477/2976,
-  16255/32752, 16259/32760, 16261/32764, 8131/16383, 2017/4064,
-  2287/4608, 15755/31744, 15247/30720, 16263/32767, 135/272,
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-  2319/4672, 16249/32736, 16257/32752, 2323/4680, 16263/32764,
-  8069/16256, 1779/3584, 15757/31744, 12199/24576, 16265/32767,
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-  8131/16380, 16139/32512, 4003/8064, 14233/28672, 7879/15872,
-  5401/10880, 1525/3072, 16235/32704, 5417/10912, 16259/32752,
-  139/280, 16265/32764, 2711/5461, 4035/8128, 16013/32256,
-  15759/31744, 7117/14336, 16267/32767, 4051/8160, 15251/30720,
-  4059/8176, 4063/8184, 4065/8188, 2033/4095, 16141/32512, 2669/5376,
-  985/1984, 3241/6528, 14235/28672, 16237/32704, 1271/2560,
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-  16015/32256, 6101/12288, 15761/31744, 16269/32767, 2701/5440,
-  3559/7168, 8119/16352, 15253/30720, 2709/5456, 8131/16376,
-  2711/5460, 4067/8191, 16143/32512, 143/288, 7881/15872, 16207/32640,
-  12203/24576, 16239/32704, 14237/28672, 16255/32736, 7627/15360,
-  16263/32752, 16267/32760, 16269/32764, 8135/16383, 1009/2032,
-  5339/10752, 15763/31744, 16271/32767, 1013/2040, 145/292,
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-  16273/32764, 8137/16383, 4037/8128, 2543/5120, 16021/32256,
-  14241/28672, 75/151, 1351/2720, 15767/31744, 4061/8176, 1355/2728,
-  4067/8188, 16149/32512, 15259/30720, 8011/16128, 7121/14336,
-  16213/32640, 1971/3968, 16245/32704, 16261/32736, 16269/32752,
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-  5087/10240, 1081/2176, 12209/24576, 7885/15872, 2321/4672,
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-  16265/32736, 16273/32752, 16277/32760, 16279/32764, 7123/14336,
-  8077/16256, 12211/24576, 16027/32256, 16281/32767, 159/320,
-  8125/16352, 15773/31744, 2711/5456, 8137/16376, 2713/5460,
-  16155/32512, 14247/28672, 4007/8064, 16219/32640, 3053/6144,
-  16251/32704, 7887/15872, 16267/32736, 16275/32752, 16279/32760,
-  16281/32764, 8141/16383, 4039/8128, 1781/3584, 16283/32767,
-  811/1632, 7633/15360, 4063/8176, 15775/31744, 4067/8184, 4069/8188,
-  407/819, 16157/32512, 1145/2304, 14249/28672, 5407/10880,
-  5089/10240, 16253/32704, 493/992, 16277/32752, 1809/3640,
-  16283/32764, 8079/16256, 6107/12288, 16031/32256, 16285/32767,
-  8111/16320, 7125/14336, 1161/2336, 3817/7680, 8135/16368,
-  15777/31744, 8139/16376, 1163/2340, 4071/8191, 16159/32512, 167/336,
-  16223/32640, 12215/24576, 16255/32704, 14251/28672, 16271/32736,
-  15269/30720, 16279/32752, 7889/15872, 16283/32760, 16285/32764,
-  8143/16383, 505/1016, 16033/32256, 16287/32767, 169/340,
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-  15781/31744, 1909/3840, 16163/32512, 7127/14336, 4009/8064,
-  5409/10880, 6109/12288, 16259/32704, 175/352, 16283/32752,
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-  4041/8128, 14255/28672, 16291/32767, 2291/4608, 4057/8160,
-  4065/8176, 4069/8184, 177/356, 15783/31744, 7637/15360, 16165/32512,
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-  16039/32256, 541/1088, 14257/28672, 8131/16352, 2713/5456,
-  8143/16376, 181/364, 4073/8191, 15785/31744, 16167/32512, 1273/2560,
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-  8133/16352, 8141/16368, 8145/16376, 8147/16380, 14261/28672,
-  15789/31744, 16171/32512, 191/384, 16267/32704, 16283/32736,
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-  7895/15872, 7131/14336, 16299/32767, 1353/2720, 16045/32256,
-  15281/30720, 581/1168, 1357/2728, 4073/8188, 97/195, 16173/32512,
-  15791/31744, 14263/28672, 16237/32640, 8023/16128, 2547/5120,
-  16269/32704, 16285/32736, 16293/32752, 16297/32760, 16299/32764,
-  6113/12288, 8087/16256, 987/1984, 16301/32767, 8119/16320,
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-  8149/16380, 4075/8191, 16175/32512, 15793/31744, 12227/24576,
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-  3821/7680, 16295/32752, 1811/3640, 16301/32764, 2717/5461,
-  1011/2032, 7897/15872, 2329/4681, 203/408, 16049/32256, 1017/2044,
-  509/1023, 16177/32512, 15795/31744, 16241/32640, 2675/5376,
-  16273/32704, 16289/32736, 16297/32752, 16301/32760, 16303/32764,
-  7643/15360, 14267/28672, 12229/24576, 8089/16256, 16305/32767,
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-  8153/16376, 233/468, 14275/28672, 16187/32512, 3059/6144,
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-  709/1424, 5437/10920, 16313/32764, 2719/5461, 3569/7168, 4047/8128,
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-  5099/10240, 16285/32704, 15807/31744, 16301/32736, 2677/5376,
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-  16303/32736, 15809/31744, 16311/32752, 251/504, 16317/32764,
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-  16315/32736, 16323/32752, 16327/32760, 16329/32764, 8165/16383,
-  4019/8064, 15821/31744, 7145/14336, 2333/4681, 4051/8128,
-  15311/30720, 4067/8160, 4075/8176, 4079/8184, 4081/8188, 157/315,
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-  8039/16128, 6125/12288, 15823/31744, 16333/32767, 8103/16256,
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-  16319/32736, 16327/32752, 2333/4680, 16333/32764, 8167/16383,
-  335/672, 15825/31744, 16335/32767, 1013/2032, 339/680, 1019/2044,
-  16081/32256, 7913/15872, 16209/32512, 16273/32640, 16305/32704,
-  16321/32736, 16329/32752, 16333/32760, 16335/32764, 3829/7680,
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-  8105/16256, 8137/16320, 8153/16352, 8161/16368, 355/712, 8167/16380,
-  15317/30720, 1787/3584, 3957/7936, 16211/32512, 6127/12288,
-  1085/2176, 16307/32704, 5441/10912, 16331/32752, 363/728,
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-  16339/32767, 15829/31744, 4053/8128, 4069/8160, 4077/8176, 371/744,
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-  16213/32512, 16277/32640, 16309/32704, 16325/32736, 16333/32752,
-  16337/32760, 16339/32764, 383/768, 16341/32767, 8107/16256,
-  15831/31744, 14299/28672, 2713/5440, 1165/2336, 2721/5456,
-  8167/16376, 389/780, 4085/8191, 16087/32256, 5107/10240,
-  12257/24576, 16215/32512, 1979/3968, 16279/32640, 3575/7168,
-  16311/32704, 16327/32736, 16335/32752, 16339/32760, 16341/32764,
-  8171/16383, 2011/4032, 7661/15360, 16343/32767, 2027/4064,
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-  5443/10912, 16337/32752, 419/840, 16343/32764, 7151/14336,
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-  15835/31744, 8141/16320, 8157/16352, 8165/16368, 8169/16376,
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-  3959/7936, 16283/32640, 16315/32704, 16331/32736, 16339/32752,
-  16343/32760, 16345/32764, 8173/16383, 447/896, 16347/32767,
-  4055/8128, 7663/15360, 1357/2720, 15837/31744, 4079/8176, 1361/2728,
-  4085/8188, 227/455, 2299/4608, 14305/28672, 16221/32512, 5109/10240,
-  3257/6528, 7919/15872, 2331/4672, 16333/32736, 16341/32752, 467/936,
-  16347/32764, 6131/12288, 8047/16128, 16349/32767, 7153/14336,
-  8111/16256, 479/960, 8159/16352, 15839/31744, 8167/16368,
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-  16351/32767, 507/1016, 509/1020, 255/511, 16097/32256, 16225/32512,
-  16289/32640, 16321/32704, 527/1056, 16345/32752, 16349/32760,
-  16351/32764, 7921/15872, 15331/30720, 14309/28672, 12265/24576,
-  16353/32767, 2683/5376, 8113/16256, 543/1088, 8161/16352, 2723/5456,
-  8173/16376, 545/1092, 15843/31744, 3833/7680, 7155/14336,
-  16099/32256, 6133/12288, 16227/32512, 16291/32640, 16323/32704,
-  16339/32736, 16347/32752, 16351/32760, 16353/32764, 8177/16383,
-  3961/7936, 5111/10240, 14311/28672, 16355/32767, 575/1152,
-  4057/8128, 4073/8160, 583/1168, 4085/8184, 4087/8188, 15845/31744,
-  7667/15360, 1789/3584, 16229/32512, 5431/10880, 16325/32704,
-  5447/10912, 16349/32752, 1817/3640, 16355/32764, 7923/15872,
-  3067/6144, 16357/32767, 8051/16128, 14313/28672, 8115/16256,
-  8147/16320, 8163/16352, 8171/16368, 8175/16376, 629/1260, 4089/8191,
-  15847/31744, 639/1280, 16103/32256, 12269/24576, 16231/32512,
-  7157/14336, 3259/6528, 16327/32704, 16343/32736, 16351/32752,
-  3271/6552, 16357/32764, 8179/16383, 1981/3968, 15337/30720,
-  2337/4681, 671/1344, 2029/4064, 679/1360, 2041/4088, 681/1364,
-  15849/31744, 7669/15360, 16105/32256, 16233/32512, 16297/32640,
-  16329/32704, 16345/32736, 711/1424, 16357/32760, 16359/32764,
-  3579/7168, 7925/15872, 12271/24576, 16361/32767, 5113/10240,
-  8053/16128, 8117/16256, 8149/16320, 8165/16352, 743/1488,
-  8177/16376, 8179/16380, 14317/28672, 15851/31744, 767/1536,
-  16235/32512, 5433/10880, 2333/4672, 5449/10912, 16355/32752,
-  779/1560, 16361/32764, 2727/5461, 3963/7936, 7159/14336,
-  16363/32767, 4027/8064, 15341/30720, 4059/8128, 815/1632, 4083/8176,
-  4087/8184, 4089/8188, 409/819, 15853/31744, 14319/28672,
-  16109/32256, 2557/5120, 16237/32512, 16301/32640, 16333/32704,
-  16349/32736, 16357/32752, 16361/32760, 16363/32764, 6137/12288,
-  7927/15872, 16365/32767, 895/1792, 8119/16256, 15343/30720,
-  2717/5440, 8167/16352, 2725/5456, 8179/16376, 909/1820, 4091/8191,
-  15855/31744, 12275/24576, 16111/32256, 14321/28672, 16239/32512,
-  959/1920, 16335/32704, 16351/32736, 16359/32752, 16363/32760,
-  16365/32764, 8183/16383, 991/1984, 16367/32767, 1007/2016,
-  1015/2032, 1019/2040, 1021/2044, 511/1023, 15857/31744, 5371/10752,
-  16241/32512, 1087/2176, 16337/32704, 5451/10912, 16361/32752,
-  1091/2184, 16367/32764, 7673/15360, 14323/28672, 12277/24576,
-  16369/32767, 7929/15872, 1151/2304, 8121/16256, 8153/16320,
-  1167/2336, 8177/16368, 8181/16376, 1169/2340, 15347/30720,
-  3581/7168, 15859/31744, 6139/12288, 16115/32256, 16243/32512,
-  16307/32640, 16339/32704, 16355/32736, 16363/32752, 1259/2520,
-  16369/32764, 8185/16383, 1279/2560, 14325/28672, 16371/32767,
-  3965/7936, 1343/2688, 4061/8128, 1359/2720, 4085/8176, 1363/2728,
-  4091/8188, 15349/30720, 7163/14336, 15861/31744, 16117/32256,
-  16245/32512, 16309/32640, 16341/32704, 1487/2976, 16365/32752,
-  16369/32760, 16371/32764, 1535/3072, 2339/4681, 7931/15872,
-  14327/28672, 8059/16128, 8123/16256, 1631/3264, 8171/16352,
-  8179/16368, 8183/16376, 1637/3276, 4093/8191, 5117/10240,
-  12281/24576, 15863/31744, 1791/3584, 16247/32512, 5437/10880,
-  16343/32704, 5453/10912, 16367/32752, 1819/3640, 16373/32764,
-  2729/5461, 1919/3840, 16375/32767, 1983/3968, 2015/4032, 2031/4064,
-  2039/4080, 2043/4088, 2045/4092, 1023/2047, 15353/30720,
-  15865/31744, 2303/4608, 16249/32512, 16313/32640, 2335/4672,
-  16361/32736, 16369/32752, 2339/4680, 16375/32764, 7165/14336,
-  12283/24576, 16377/32767, 2559/5120, 7933/15872, 2687/5376,
-  8125/16256, 2719/5440, 8173/16352, 2727/5456, 8185/16376, 2729/5460,
-  14331/28672, 3071/6144, 15867/31744, 16123/32256, 16251/32512,
-  3263/6528, 16347/32704, 16363/32736, 16371/32752, 3275/6552,
-  16377/32764, 8189/16383, 3583/7168, 16379/32767, 3839/7680,
-  3967/7936, 4031/8064, 4063/8128, 4079/8160, 4087/8176, 4091/8184,
-  4093/8188, 2047/4095, 14333/28672, 5119/10240, 15869/31744,
-  5375/10752, 16253/32512, 5439/10880, 16349/32704, 5455/10912,
-  16373/32752, 5459/10920, 16379/32764, 6143/12288, 16381/32767,
-  7167/14336, 7679/15360, 7935/15872, 8063/16128, 8127/16256,
-  8159/16320, 8175/16352, 8183/16368, 8187/16376, 8189/16380,
-  4095/8191, 12287/24576, 14335/28672, 15359/30720, 15871/31744,
-  16127/32256, 16255/32512, 16319/32640, 16351/32704, 16367/32736,
-  16375/32752, 16379/32760, 16381/32764, 8191/16383, 16383/32767, 1/2
-  ];
-
-    fi;
-
-    MasterSlave(function() # iterator
-        local i, new;
-
-	if IsBound(job) then
-	    if job=[] then
-		return NOTASK;
-	    else
-		i := Remove(job,1);
-		Add(points,[i,fail]);
-		return i;
-	    fi;
-	fi;
-
-        i := Length(points);
-        if i=0 then
-            Add(points,[0,fail]);
-            return 0;
-        fi;
-        if points[i][1]<1 and IsInt(mindenom*points[i][1]) then
-            Add(points,[points[i][1]+1/mindenom,fail]);
-            return points[i+1][1];
-        fi;
-	i := 2; while i <= Length(points) do
-            if ForAll(points{[i-1,i]},p->DenominatorRat(p[1])<maxdenom and p[2]<>fail) then # something to subdivide
-                if false and IS_COMPLEX(points[i-1][2]) and IS_COMPLEX(points[i][2]) and AbsoluteValue(points[i][2]-points[i-1][2])<mindist then
-		    i := i+1;
-		    continue;
-		fi; # don't waste time here, points are very close
-		new := (points[i-1][1]+points[i][1])/2;
-                Add(points,[new,fail],i);
-                return new; # new task
-            fi;
-	    i := i+1;
-        od;
-        return NOTASK; # done
-    end,
-    task, # task
-      function(input,output) # check result, save locally
-        points[PositionProperty(points,x->x[1]=input)][2] := i2c(output);
-	Info(InfoFR,1,input," gives ",output," ",i2c(output));
-        return NO_ACTION;
-    end,
-      Error); # update data
-
-    return points;
-end);
-
-################################################################
-points := makemeone(mindenom,maxdenom,mindist,maxpcset,type);
-
-file := Concatenation(type,"-",String(maxpcset));
-PrintTo(file,"# gnuplot data -- maxpcset=",maxpcset," type=",type,"\n");
-#file := Concatenation(type,"-",String(maxdenom));
-#PrintTo(file,"# gnuplot data -- maxdenom=",mindenom," maxdenom=",maxdenom," mindist=",mindist," type=",type,"\n");
-lastinfinity := true;
-for i in [1..Length(points)] do
-    if IsInt(points[i][2]) then
-	real := infinity;
-	imag := infinity;
-	lastinfinity := true;
-    else
-	if not lastinfinity and AbsoluteValue(points[i-1][2]-points[i][2])>10*mindist then
-	    AppendTo(file,"infinity\t0\n"); # a jump in gnuplot
-	fi;
-	real := RealPart(points[i][2]);
-	imag := ImaginaryPart(points[i][2]);
-	lastinfinity := false;
-    fi;
-    AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(6,MacFloat(points[i][1])),"\n");
-od;
-# hubbard.g . . . . . . . . . . . . . . . . . . . . . . . . . ends here
-# recover angles:
-# awk '$1=="master" {n=substr($3,1,length($3)-1); angle[n]=$4; split($4,a,"/"); if(length(a)==1)a[2]=1; angleval[n]=1.0*a[1]/a[2]} $3=="master:" {if(NF==7){printf "%.10g\t%.10g\t%s\t%g\n",substr($5,1,length($5)-1)/10000000000.0,$6/10000000000.0,angle[$1],angleval[$1]}else{print "infinity\tinfinity\t" angle[$1] "\t" angleval[$1]}}' < log.
-# awk '{split($3,a,"/");if(a[2]==0)a[2]=1;b=a[1]*16384/a[2];seen[b]++} END{for(i=1;i<=11702;i++) if(seen[i]!=1) print i ",";for(i=14043;i<=16384;i++) if(seen[i]!=1) print i ","}' < rabbit-temp >
-quit;
-
-MakeReadWriteGlobal("ErrorInner");
-ErrorInner := function(arg) JUMP_TO_CATCH(arg{[2..Length(arg)]}); end;
-
-hard := [8199, 8850, 9349, 9457, 9785, 9800, 10508, 10628, 10822,
-11279, 11308, 11573, 11618, 11690, 14082, 14139, 14211, 14383,
-14457, 14685, 14779, 15085, 15700]/16384;
-
-points := [];
-
-for angle in angles2 do
-  v := CALL_WITH_CATCH(RationalFunction,[Mating(PolynomialIMGMachine(2,[angle],false),PolynomialIMGMachine(2,[1/7]))]:param_v:=3);
-  Info(InfoFR,1,"Angle ",angle,": spider converged to ",v);
-  Add(points,[angle,v]);
-od;
-
-file := "xx";
-PrintTo(file,"");
-for i in [1..Length(points)] do
-real := STRING_DIGITS_MACFLOAT(10,RealPart(points[i][2]));
-imag := STRING_DIGITS_MACFLOAT(10,ImaginaryPart(points[i][2]));
-AppendTo(file,real,"\t",imag,"\t",String(points[i][1]),"\t",STRING_DIGITS_MACFLOAT(8,MacFloat(points[i][1])),"\n");
-od;
-
-a2c(x,y) = 2*(x+{0,1}*y)/(x+{0,1}*y+1)
-
-plot [-0.7:3.75] [-1.98:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'airplane-13'  using (real(a2c($1,$2))):(imag(a2c($1,$2))) with lines,'rabbit-11-16384'  using (real(a2c($1,-$2))):(imag(a2c($1,-$2))) with lines
-set term pdfcairo size 29.7cm,21cm
-set out "wittner.pdf"
-replot
-set term png size 1112,990
-set out "wittner.png"
-replot
-plot [0.43:1.9] [0.5:1.98] '< convert -negate -colorspace Gray per3.jpg avs:-' binary filetype=avs origin=(-0.835,-1.995) dx=0.00445 dy=0.00445 with rgbimage,'rabbit-11-16384' using (real(a2c($1,$2))):($4 > 0.33333 && $4 < 0.666666 ? imag(a2c($1,$2)):1/0):(150+($4-0.333333)*150*3) with lines linew 2.0 palette,'airplane-13'  using (real(a2c($1,$2))):($4 > 0.142857 && $4 < 0.285715 ? imag(a2c($1,$2)):1/0):(30+($4-0.285714)*1000) with lines linew 2.0 palette
-
-# awk 'BEGIN{printf "points := ["} NF==8 && $3=="gives" {print "[" $2 ",Complex(\"" $8 "\")],"} END{print "fail];Remove(points);"}' < log.*
diff --git a/sandbox/wittner/logextract.g b/sandbox/wittner/logextract.g
deleted file mode 100755
index 9af6b32..0000000
--- a/sandbox/wittner/logextract.g
+++ /dev/null
@@ -1,61 +0,0 @@
-LoadPackage("fr");
-LoadPackage("io");
-
-parabolic := function(angle,z)
-    local s, n;
-    
-    if IsEvenInt(DenominatorRat(angle)) then
-        return z;
-    fi;
-    n := First(Integers,n->n>=1 and IsInt((2^n-1)*angle));
-    s := IO_PipeThrough("./parabolic",[String(RealPart(z)),String(ImaginaryPart(z)),String(n),"1.0","0.0"],"");
-    return Complex(s);
-end;
-
-points := [];
-
-makegnuplot := function(outfile)
-   local f, l, real, imag, z;
-
-   f := IO_Popen2("/usr/bin/ssh",["-C","gauss04","grep -2 gives log.total"]);
-   points := [];
-   while true do
-       l := IO_ReadLine(f.stdout);
-       if l="" or l=fail then break; fi;
-       z := SplitString(l,"",WHITESPACE);
-       if Length(z)<3 or z[3]<>"gives" then continue; fi;
-       if z[4]="[" and Length(z)<8 then
-           Append(l,IO_ReadLine(f.stdout));
-           z := SplitString(l,"",WHITESPACE);
-       fi;
-       if z[4]<>"[" then Add(points,[EvalString(z[2]),z[4]]); continue; fi;
-       Add(points,[EvalString(z[2]),Complex(z[8])]);
-   od;
-   IO_Close(f.stdout);
-   Sort(points);
-   f := OutputTextFile(outfile,false);
-   PrintTo(f, "# temporary gnuplot data\n");
-   for l in points do
-       if IsString(l[2]) then
-           real := "inf"; imag := EvalString(l[2]);
-       else
-           z := parabolic(l[1],l[2]);
-           z := 2*z/(z+1);
-           real := STRING_DIGITS_MACFLOAT(10,RealPart(z));
-           imag := STRING_DIGITS_MACFLOAT(10,ImaginaryPart(z));
-       fi;
-       PrintTo(f,real,"\t",imag,"\t",String(l[1]),"\t",STRING_DIGITS_MACFLOAT(8,MacFloat(l[1])),"\n");
-   od;
-   CloseStream(f);
-end;
-
-makegnuplot("rees-data");
-Exec("grep -v 'inf.*1' rees-data > rees-temp");
-
-maxpcset := 16;
-job := [];
-    # classical job
-for i in Combinations([0..maxpcset],2) do
-    j := 2^i[2]-2^i[1];
-    UniteSet(job,Filtered([0..j-1]/j,angle->IsEvenInt(DenominatorRat(angle)) and angle >= 2/7 and angle <= 1/3));
-od;
diff --git a/sandbox/wittner/mandelbrot-16 b/sandbox/wittner/mandelbrot-16
deleted file mode 100644
index 7a19651..0000000
--- a/sandbox/wittner/mandelbrot-16
+++ /dev/null
@@ -1,1079 +0,0 @@
-
-# mandelbrot data
-0	0
-0.3263728732	0.034071447
-0.3407363869	0.0454967275
-0.3446029234	0.0500649754
-0.3439489354	0.0560718299
-0.3556486855	0.0603891929
-0.3590789944	0.0625891973
-0.3637981326	0.0693065576
-0.3621521493	0.0769702718
-0.3779276121	0.08573145140000001
-0.3825482266	0.0892433512
-0.3827560313	0.093020122
-0.3881326459	0.0994747335
-0.3890161683	0.104932929
-0.3847274301	0.1092832944
-0.4001395532	0.1250588605
-0.4056365874	0.1269686657
-0.4119958597	0.1328787832
-0.4118244838	0.138077542
-0.4163662421	0.1460311988
-0.4180009653	0.1490644977
-0.4102383323	0.1495123435
-0.4178982152	0.1927261494
-0.427737763	0.1936265767
-0.4304119966	0.1961195088
-0.4368686128	0.1977261846
-0.4385676638	0.2019081696
-0.4457836244	0.2083806729
-0.4447916676	0.2157595416
-0.445684652	0.2274864002
-0.4483987133	0.2299501061
-0.450243893	0.2349683833
-0.4488300188	0.2375958006
-0.447485612	0.2464893475
-0.4436791376	0.251165377
-0.4382011356	0.250541643
-0.3988481059	0.2687254912
-0.4134885046	0.3024360699
-0.4205457495	0.3077535318
-0.4225580128	0.3126357304
-0.4370135584	0.3150314268
-0.440175734	0.314624011
-0.44546236	0.3199387899
-0.4550944793	0.3247183173
-0.4578842358	0.3253935442
-0.4603506014	0.332463653
-0.4641866282	0.343232262
-0.4675275211	0.3437847704
-0.4704260283	0.3465883313
-0.471178145	0.3540693585
-0.4676846294	0.3575514194
-0.4491296936	0.3660487836
-0.4596325296	0.3771747242
-0.4647565026	0.3826984502
-0.4664454582	0.3915477505
-0.464038063	0.395029433
-0.4574457337	0.4005721017
-0.4584611206	0.4037040168
-0.4574733802	0.4075136264
-0.4504750553	0.4121167595
-0.4445568792	0.4099331083
-0.4404732555	0.3852631402
-0.4011719158	0.3831255882
-0.3900852168	0.3888031604
-0.3816867497	0.3886242492
-0.3626507481	0.4162105202
-0.3641064679	0.4262188406
-0.3590870926	0.4407185053
-0.3516215083	0.4468937053
-0.3502963148	0.4942766438
-0.3629353459	0.502445221
-0.3651519235	0.5070386042
-0.3691591249	0.5165417063
-0.3722403397	0.5185040037
-0.3725562862	0.5277827197
-0.3841240207	0.5611477081
-0.3955909772	0.5544417759
-0.4033539004	0.556049287
-0.4049268076	0.5583420197
-0.4090469084	0.5655139446
-0.4078889472	0.5710301944
-0.3909328341	0.5749148024
-0.3979323853	0.598809676
-0.4061178975	0.6004223665
-0.4135654534	0.6002685025
-0.4196433776	0.6062907292
-0.4197147566	0.6093688489
-0.4176549156	0.6169461764
-0.4185095366	0.619567227
-0.4130067179	0.6241266090000001
-0.4126458327	0.6159448519
-0.3975300853	0.6094641762
-0.3898534208	0.6125165799
-0.3863517913	0.6127709886
-0.3711960258	0.6255846134
-0.3724478447	0.6328701351
-0.3715564686	0.6448523748
-0.3713914675	0.6503815091
-0.3805146202	0.6630152155
-0.3832246485	0.6637704333
-0.3837844249	0.6688906395999999
-0.3767254078	0.6749476845
-0.3821996123	0.6791481676
-0.3837394255	0.6817392283
-0.3797396845	0.6867748339
-0.3779282683	0.6814147124
-0.3667688995	0.682291678
-0.3608954026	0.6877763726
-0.3638162273	0.6950401071
-0.3611731294	0.7013895156
-0.3589735409	0.7025232407000001
-0.3498461594	0.7043016223
-0.3439069959	0.7006200202
-0.3494607529	0.6988725586
-0.3538582021	0.6894790146999999
-0.3581153161	0.6811812171
-0.3545230553	0.6644542432
-0.3491065827	0.6605043353
-0.3423674576	0.647919075
-0.3392490767	0.6394186358
-0.2978156884	0.6141752498
-0.2824923031	0.6238592142
-0.2765690533	0.6245744124
-0.2632922532	0.6222988662
-0.2587016547	0.6256674122
-0.2501452745	0.6249786906
-0.246040174	0.6214842779
-0.1948179726	0.5929148822
-0.172260369	0.6350267231
-0.1720936795	0.6424967548
-0.1703283088	0.6453699688
-0.1634221133	0.6588418613
-0.1655274524	0.6637175284
-0.1606137515	0.6707835033
-0.1444572321	0.6779791806
-0.1421874217	0.686192185
-0.1403937586	0.6882658762
-0.1328592778	0.6919700783
-0.1264966612	0.691780861
-0.1161214987	0.6686806444
-0.0688585511	0.6640661587
-0.0556545718	0.6735745613
-0.0476954266	0.676341125
--0.009074529899999999	0.7045041329
-0.013177803	0.7364996849
-0.0206662699	0.757481679
-0.0212258609	0.7658806303
-0.0249540585	0.8040848408
-0.0371336723	0.8063783164
-0.0409789265	0.8154848383
-0.0402543476	0.8197234963
-0.0252939539	0.8223644779
-0.0244017026	0.8443923615
-0.0285989434	0.8482045286
-0.0334344315	0.8558285329999999
-0.0341469612	0.8590203734
-0.0285958712	0.8647558978
-0.0302507925	0.8687928646
-0.0256548492	0.8733628229
-0.0228283284	0.8654351284
-0.0067275859	0.8566847865
--0.0006591645	0.8582942877
--0.0040757958	0.8578979837
--0.0395127352	0.8372949852
--0.049590676	0.8777111128
--0.052002774	0.9011456656
--0.0537663655	0.9094278614
--0.0730163675	0.9606725104
--0.040832328	0.9728743301
--0.0344281348	0.9739598333
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--1.2633672734	-0.4200289548
--1.2649070213	-0.4168348298
--1.2471511588	-0.4091699385
--1.2401104011	-0.4158564915
--1.2385297018	-0.4187585001
--1.2401104011	-0.4158564915
--1.2471511588	-0.4091699385
--1.2551162987	-0.394405617
--1.2403974024	-0.38311838
--1.2574804903	-0.3666438355
--1.2228637872	-0.3168822639
--1.1958482397	-0.3258074003
--1.1942506527	-0.3345658669
--1.1958482397	-0.3258074003
--1.1537644186	-0.3246729142
--1.14959741	-0.3417306991
--1.1494643725	-0.347188795
--1.14959741	-0.3417306991
--1.1537644186	-0.3246729142
--1.1215495572	-0.2951669684
--1.1123875299	-0.3136254536
--1.1215495572	-0.2951669684
--1.0300291783	-0.3268445298
--1.0480839714	-0.3573219927
--1.055460535	-0.3617211001
--1.0480839714	-0.3573219927
--1.0276641091	-0.3790158898
--1.0357688891	-0.3843825105
--1.0295276543	-0.3908153014
--1.0310510893	-0.3953444077
--1.0295276543	-0.3908153014
--1.0247783142	-0.3902178907
--1.0260341042	-0.3893464612
--1.0276641091	-0.3790158898
--1.0146166891	-0.3720026023
--1.0094569666	-0.3754033131
--1.0146166891	-0.3720026023
--1.0300291783	-0.3268445298
--0.9899628367	-0.3192197419
--0.9842496485	-0.329285517
--0.9899628367	-0.3192197419
--0.9299546157	-0.2918867969
--0.9193819634	-0.3199113746
--0.9184503692	-0.3296730137
--0.9193819634	-0.3199113746
--0.9299546157	-0.2918867969
--0.8739318847000001	-0.2553828557
--0.8616374697	-0.2778220439
--0.8739318847000001	-0.2553828557
-0	0
--0.7084906203	-0.308536587
--0.7351974171	-0.360184278
--0.7210531631	-0.3627471124
--0.6849450646	-0.380101465
--0.6846870993	-0.4355367881
--0.703282557	-0.4397678362
--0.7012349384	-0.4432138698
--0.69688234	-0.4519656411
--0.7073376522	-0.4682595748
--0.7136263729	-0.473794619
--0.7070668617	-0.475392625
--0.6998649026	-0.4763234291
--0.6968447838	-0.4818748505
--0.6920223722	-0.476948909
--0.6667198575	-0.4811191337
--0.6593040204	-0.5027908241
--0.6532745760999999	-0.5009859516
--0.6356170289	-0.4919204153
--0.5681077375	-0.5020099994
--0.5911360246	-0.5522537035
--0.5859387671	-0.5599186347
--0.5779192953	-0.582615189
--0.6121889455	-0.6066976699
--0.6246327708	-0.6080742608
--0.6206161144	-0.6146269298
--0.6149908941	-0.6206339008
--0.617226806	-0.6279406211
--0.6106129567	-0.6293060268
--0.6101362	-0.6665612281
--0.6252977658	-0.6638104659
--0.6241356219	-0.6709073813999999
--0.6276354186000001	-0.6815761832
--0.631586257	-0.6794731029
--0.6318168557	-0.6816361085
--0.6367543466	-0.6850312971
--0.63341454	-0.686595029
--0.6255569431	-0.6876812219
--0.6163067242	-0.6873534748
--0.6132914894	-0.6859415192
--0.6064216966	-0.6905464869
--0.6054014816	-0.6944312673
--0.5997883798	-0.6871383164
--0.5821213549000001	-0.6631800715
--0.5696633641	-0.6825440009
--0.5666177186	-0.6813240404999999
--0.5590936491	-0.6771044979
--0.5317048612	-0.6756406637
--0.5391255967	-0.6901531446
--0.5339373374	-0.6922565743
--0.5300254432	-0.7018544296
--0.5305242665	-0.7065770818
--0.5227992769000001	-0.7022155499
--0.5172819808	-0.6937880440999999
--0.5060174217	-0.693773843
--0.5062944582	-0.6839919681
--0.5260364396	-0.6588948781
--0.4813069697	-0.6473819014
--0.4765577835	-0.6404778746000001
--0.4601434471	-0.6207333809
--0.4006758037	-0.6550070727
--0.4003391232	-0.682380619
--0.3957845763	-0.6831954734
--0.3862084888	-0.6819822993
--0.3738577885	-0.6759978604
--0.3609156256	-0.6850443155
--0.357680392	-0.6836268237999999
--0.3511870608	-0.6773401247
--0.2864047772	-0.668069239
--0.2786543689	-0.7502949695
--0.2737934889	-0.7609052068
--0.2627076867	-0.7835452423
--0.2503569953	-0.8178439097
--0.2827728132	-0.8265553086
--0.287745138	-0.8343035009999999
--0.300079646	-0.8417705356
--0.3064815656	-0.842099897
--0.3016330222	-0.8486652371
--0.2942608073	-0.8500620534
--0.2918643285	-0.8581665168
--0.2872441734	-0.8575939125000001
--0.2841452491	-0.8518802996
--0.2710775742	-0.8575556835
--0.2626308083	-0.8580220451
--0.2488346326	-0.8757498651
--0.2537014793	-0.8861557492
--0.2494987021	-0.8876530258000001
--0.2407916655	-0.8887068208
--0.2384341405	-0.8864443999
--0.2254202794	-0.8684955090000001
--0.1829430633	-0.8987401181
--0.1747858285	-0.9037950841
--0.1529716386	-0.9164139581
--0.1184426885	-0.9366129654000001
--0.1413394029	-0.9733368538
--0.1417644146	-0.9790925562
--0.1431117434	-0.9929659462
--0.1708314389	-1.0209272626
--0.1849514997	-1.0136286163
--0.1856677277	-1.0180560458
--0.185350335	-1.026353215
--0.1836345514	-1.028060377
--0.1743149413	-1.0450513218
--0.1882353542	-1.0507991901
--0.1865269712	-1.0551395895
--0.1798185983	-1.0557329998
--0.1790403183	-1.0689311798
--0.1796101965	-1.0783618277
--0.1871549019	-1.0926936674
--0.1992866571	-1.0952076238
--0.2039188523	-1.1001279361
--0.2091180791	-1.1042121745
--0.2099957264	-1.1107126179
--0.2171893779	-1.1136396123
--0.2212876571	-1.1143251013
--0.2281554937	-1.1151425081
--0.2217389819	-1.119479436
--0.2134406199	-1.1155918224
--0.2074202047	-1.1226817833
--0.2046002176	-1.1201607108
--0.2070033401	-1.1148142996
--0.2060465803	-1.1074613078
--0.1977974142	-1.1047531614
--0.1927623156	-1.101081507
--0.1852706438	-1.0990083426
--0.178804525	-1.0911645587
--0.1675897649	-1.0983080016
--0.1617357497	-1.1033883479
--0.1580065738	-1.1105462554
--0.1587776187	-1.1137793641
--0.155846916	-1.1117803716
--0.1524877573	-1.1034462394
--0.1597005884	-1.0979270602
--0.1651034723	-1.0900877273
--0.1720190031	-1.0869736459
--0.1703284777	-1.0744895165
--0.1707560644	-1.0708667185
--0.169104698	-1.0643854948
--0.1509140838	-1.0471846
--0.1427563107	-1.055842799
--0.1410238459	-1.053253697
--0.1393397717	-1.0454241583
--0.1432092916	-1.0266732607
--0.1247012089	-1.0271338417
--0.123189749	-1.0214850161
--0.1300225884	-1.0165637417
--0.1194587027	-1.0007248307
--0.1180388605	-0.9970234423
--0.1126759158	-0.9862388732
--0.0741528214	-0.9789164692
--0.0676908886	-1.0014697095
--0.0617271565	-1.0007846216
--0.0599654136	-0.9937704118
--0.0474104411	-0.9989710696
--0.042308121	-0.997891552
--0.0234289343	-1.0010247685
--0.0233479609	-1.017406315
--0.0157675428	-1.0228748892
--0.0157593863	-1.030866398
--0.0146045402	-1.0336630533
--0.0171879774	-1.0376523438
--0.0132515433	-1.0364943113
--0.0077880393	-1.0294903903
--0.0102553933	-1.0237293128
--0.0150717528	-1.0181771094
--0.0172418715	-1.0109704657
--0.008849197	-1.0083940038
--0.0062396147	-1.0039167994
-0.002241106	-1.0069870044
--1e-10	-1
--0.0077798085	-1.0031540068
--0.0227985072	-0.9970091074
--0.0180849851	-0.9825183226999999
--0.0217982338	-0.9797466224
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--0.040832328	-0.9728743302
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--0.0537663655	-0.9094278615
--0.052002774	-0.9011456657
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--0.0395127352	-0.8372949853
--0.0040757958	-0.8578979838
--0.0006591645	-0.8582942878000001
-0.0067275859	-0.8566847866
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-0.0212258609	-0.7658806304
-0.0206662699	-0.7574816791
-0.013177803	-0.736499685
--0.009074529899999999	-0.704504133
-0.0476954266	-0.6763411251
-0.0556545718	-0.6735745614
-0.0688585511	-0.6640661588
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-0.2501452745	-0.6249786907
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-0.3491065827	-0.6605043354
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-0.3538582021	-0.6894790148
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-0.3629353459	-0.5024452211
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-0.4385676638	-0.2019081697
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-0.3847274301	-0.1092832945
-0.3890161683	-0.1049329291
-0.3881326459	-0.0994747336
-0.3827560313	-0.09302012210000001
-0.3825482266	-0.0892433513
-0.3779276121	-0.0857314515
-0.3621521493	-0.0769702719
-0.3637981326	-0.06930655769999999
-0.3590789944	-0.0625891974
-0.3556486855	-0.060389193
-0.3439489354	-0.05607183
-0.3446029234	-0.0500649755
-0.3407363869	-0.0454967276
-0.3263728732	-0.0340714471
-0	0
diff --git a/sandbox/wittner/mandelbrotx.gz b/sandbox/wittner/mandelbrotx.gz
deleted file mode 100644
index 3fd7798..0000000
Binary files a/sandbox/wittner/mandelbrotx.gz and /dev/null differ
diff --git a/sandbox/wittner/mary-rees.g b/sandbox/wittner/mary-rees.g
deleted file mode 100644
index 8c0274c..0000000
--- a/sandbox/wittner/mary-rees.g
+++ /dev/null
@@ -1,25 +0,0 @@
-x := n->4/3*(13*2^(n-3)-1)/(2^(n+3)-1);
-y := n->2^(n+1)/(2^(n+3)-1);
-z := n->2/7*(6*2^n+1)/(2^(n+3)-1);
-Read("F.g");
-
-for i in [3,6..30] do
-    t := Runtime(); j := F(z(i)); Print("n=",i," z=",z(i), " F(z)=",j, " time=",Runtime()-t,"\n");
-od;
-#for i in [1..15] do
-#    t := Runtime(); j := F(y(i)); Print("n=",i," y=",y(i), " F(y)=",j, " time=",Runtime()-t,"\n");
-#od;
-a := function(n)
-    if IsOddInt(n) then
-        return (9*2^(n-1)-7)/(8*2^n-1);
-    else
-        return (9*2^(2*n+2)+51*2^(n-1)-7)/(2^(2*n+6)-1);
-    fi;
-end;
-b := function(n)
-    if IsOddInt(n) then
-        return 2/3*(5*2^n-1)/(8*2^n-1);
-    else
-        return 1/3*(10*2^n-1)/(8*2^n-1);
-    fi;
-end;
diff --git a/sandbox/wittner/mrregion.png b/sandbox/wittner/mrregion.png
deleted file mode 100644
index 0402fa2..0000000
Binary files a/sandbox/wittner/mrregion.png and /dev/null differ
diff --git a/sandbox/wittner/mrzoom.png b/sandbox/wittner/mrzoom.png
deleted file mode 100644
index af55811..0000000
Binary files a/sandbox/wittner/mrzoom.png and /dev/null differ
diff --git a/sandbox/wittner/nonmating b/sandbox/wittner/nonmating
deleted file mode 100644
index 7e5b597..0000000
--- a/sandbox/wittner/nonmating
+++ /dev/null
@@ -1,33 +0,0 @@
-a =  4.305897406;
-c = 1.623060936
-4.3058974410849171229
-1.6230609388501387320
-p> a := Complex("4.3058974410849171229");                                                         
-4.305897441084917                                                                                   
-gap> f := 1-(a+1)/z+a/z^2;                                                                          
-1+(-5.305897441084917)*z^-1+4.305897441084917*z^-2                                                  
-gap> IMGMachine(f);
-<F
-> Display(ChangeFRMachineBasis(m,[f4^-1/f3,f6]));
- G  |                     1               2                                                         
-----+------------------------+---------------+
- f1 |    f7^-1*f2^-1*f6^-1,2   f3*f6*f2*f7,1  
- f2 | f3*f4*f1*f4^-1*f3^-1,1          <id>,2  
- f3 |       <identity ...>,1            f2,2  
- f4 |       <identity ...>,2            f7,1  
- f5 |          f3*f4*f3^-1,1          <id>,2  
- f6 |                   f5,1          <id>,2  
- f7 |       <identity ...>,1            f6,2  
-----+------------------------+---------------+
-Relator: f5*f3*f4*f1*f6*f2*f7
-G  |      1         2                                                                              
-----+---------+---------+
- f1 | f3*f6,2   f6^-1,1  
- f2 |    f1,1    <id>,2  
- f3 |  <id>,1      f2,2  
- f4 | f2^-1,2   f2*f7,1  
- f5 |    f4,1    <id>,2  
- f6 |    f5,1    <id>,2  
- f7 |  <id>,1      f6,2  
-----+---------+---------+
-Relator: f5*f1*f4*f3*f6*f2*f7
diff --git a/sandbox/wittner/nonmating.png b/sandbox/wittner/nonmating.png
deleted file mode 100644
index 7da59da..0000000
Binary files a/sandbox/wittner/nonmating.png and /dev/null differ
diff --git a/sandbox/wittner/parabolic b/sandbox/wittner/parabolic
deleted file mode 100755
index 08e3313..0000000
Binary files a/sandbox/wittner/parabolic and /dev/null differ
diff --git a/sandbox/wittner/parabolic.c b/sandbox/wittner/parabolic.c
deleted file mode 100644
index b731682..0000000
--- a/sandbox/wittner/parabolic.c
+++ /dev/null
@@ -1,120 +0,0 @@
-#include <gsl/gsl_vector.h>
-#include <gsl/gsl_multiroots.h>
-#include <complex.h>
-#include <stdio.h>
-
-_Complex double gsl_get (const gsl_vector *vreal, int n)
-{
-  return gsl_vector_get (vreal, 2*n) + 1.0i * gsl_vector_get (vreal, 2*n+1);
-}
-
-void gsl_set (gsl_vector *vreal, int n, _Complex double x)
-{
-  gsl_vector_set (vreal, 2*n, creal(x));
-  gsl_vector_set (vreal, 2*n+1, cimag(x));
-}
-
-void cprint (FILE *f, _Complex double z)
-{
-  fprintf(f,"%.10lf", creal(z));
-  if (cimag(z)>=0.0)
-    fprintf(f,"+%.10lf*I", cimag(z));
-  else
-    fprintf(f,"-%.10lf*I", -cimag(z));
-}
-
-_Complex double f(_Complex double a, _Complex double z)
-{
-  return 1.0 - (a+1.0)/z + a/(z*z);
-}
-
-_Complex double df(_Complex double a, _Complex double z)
-{
-  return ((a+1.0) - 2.0*a/z) / (z*z);
-}
-
-int parabolic (const gsl_vector *xreal, void *param, gsl_vector *freal)
-{
-  /* x = (a,c1,...,cn)
-   * compute f = (prod f'_a(c_i)-multiplier,f_a(c_1)-c_2,...,f_a(c_n)-c_1
-  */
-  int n = xreal->size/2 - 1;
-  double _Complex multiplier = *(_Complex double *)param;
-  _Complex double a = gsl_get (xreal, 0), z[n];
-  for (int i = 0; i < n; i++)
-    z[i] = gsl_get (xreal, i+1);
-
-  _Complex double m = 1.0;
-  for (int i = 0; i < n; i++)
-    m *= df(a,z[i]);
-
-  gsl_set (freal, 0, m - multiplier);
-  for (int i = 0; i < n; i++)
-    gsl_set (freal, i+1, f(a,z[i]) - z[(i+1) % n]);
-
-  return GSL_SUCCESS;
-}
-
-int main (int argc, char *argv[])
-{
-  if (argc != 6) {
-    fprintf(stderr, "Use: %s a.real a.imag n mult.real mult.imag\n", argv[0]);
-    return -1;
-  }
-
-  _Complex double a = strtod(argv[1],NULL)+1.0i*strtod(argv[2],NULL);
-  int n = strtol(argv[3],NULL,10);
-  _Complex double m0 = strtod(argv[4],NULL)+1.0i*strtod(argv[5],NULL);
-  _Complex double z[100] = { 2.0*a/(a+1.0) };
-  for (int i = 1; i < n; i++)
-    z[i] = f(a,z[i-1]);
-
-  const double precision = 1.e-10;
-  double error;
-  _Complex double multiplier = 0.0;
-  double speed = 0.5; /* speed=1 means "instant jump" */
-
-  do {
-    _Complex double m1 = (1.0-speed)*multiplier + speed*m0;
-
-    gsl_vector *x = gsl_vector_alloc (2*(1+n));
-    gsl_set (x, 0, a);
-    for (int i = 0; i < n; i++) gsl_set (x, i+1, z[i]);
-
-    gsl_multiroot_fsolver *s = gsl_multiroot_fsolver_alloc (gsl_multiroot_fsolver_hybrids, 2*(1+n));
-    gsl_multiroot_function f = {&parabolic, 2*(1+n), &m1};
-    gsl_multiroot_fsolver_set (s, &f, x);
-
-    for (int iter = 0; ; iter++) {
-      int status = gsl_multiroot_fsolver_iterate (s);
-
-      if (iter == 100 || status) {
-	speed *= 0.5; /* 50% slower */
-	break;
-      }
-      if (gsl_multiroot_test_residual (s->f, precision) != GSL_CONTINUE) {
-	multiplier = m1; /* go further */
-	speed = (0.1+speed)/1.1; /* try 10% faster */
-	break;
-      }
-    }
-
-    a = gsl_get (s->x, 0);
-    for (int i = 0; i < n; i++)
-      z[i] = gsl_get (s->x, i+1);
-
-    error = cabs(gsl_get (s->f, 0));
-
-    gsl_multiroot_fsolver_free (s);
-    gsl_vector_free (x);
-  } while (cabs(multiplier - m0) > precision);
-
-  cprint(stdout,a);
-#if 1
-  printf("\n");
-#else
-  printf(" error=%g\n",error);
-#endif
-
-  return 0;
-}
diff --git a/sandbox/wittner/v3 b/sandbox/wittner/v3
deleted file mode 100755
index c2c02a8..0000000
Binary files a/sandbox/wittner/v3 and /dev/null differ
diff --git a/sandbox/wittner/v3.c b/sandbox/wittner/v3.c
deleted file mode 100644
index 7d9e5b0..0000000
--- a/sandbox/wittner/v3.c
+++ /dev/null
@@ -1,89 +0,0 @@
-#include <complex.h>
-extern "C" {
-#include <ppm.h>
-}
-
-int MAXITER = 1000;
-
-double cnorm (_Complex double z)
-{
-  return creal(z)*creal(z) + cimag(z)*cimag(z);
-}
-
-int color (_Complex double a)
-{
-  _Complex double c = 2*a/(a+1), z[MAXITER];
-  z[0] = c;
-  double dz = 1.0;
-  int i, j;
-
-  for (i = 1; i < MAXITER; i++) {
-    _Complex double zz = 1.0/(z[i-1]*z[i-1]);
-    z[i] = 1.0 - (a+1.0)/z[i-1] + a*zz;
-    dz *= cnorm(((a+1.0) - 2.0*a/z[i-1])*zz);
-
-    if (cnorm(z[i]) < 1.e-10)
-      return (MAXITER-i) % 3;
-    if (cnorm(z[i]) > 1.e10)
-      return (MAXITER+1-i) % 3;
-    if (cnorm(z[i]-1.0) < 1.e-10)
-      return (MAXITER+2-i) % 3;
-    /* if (cnorm(z[i]-z[i/2]) < dz)
-       return -2; */
-    if (cnorm(z[i]-z[i/2]) < 1.e-10)
-      return -1;
-  }
-  return -2; /* unknown color */
-}
-
-main(int argc, char *argv[]) {
-  ppm_init (&argc, argv);
-
-  if (argc != 6) {
-    printf("Use: LL UR DX DY MAXITER\n");
-    return -1;
-  }
-
-  _Complex double LL, UR;
-  { double a, b; sscanf(argv[1], "%lf+%lfi", &a, &b); LL = a+1.0i*b; }
-  { double a, b; sscanf(argv[2], "%lf+%lfi", &a, &b); UR = a+1.0i*b; }
-  double DX = strtod (argv[3],NULL);
-  double DY = strtod (argv[4],NULL);
-  MAXITER = strtol (argv[5],NULL,10);
-
-  int CSIZE = (creal(UR)-creal(LL))/DX + 1;
-  int RSIZE = (cimag(UR)-cimag(LL))/DY + 1;
-
-  pixel *array[RSIZE];
-  for (int i = 0; i < RSIZE; array[i++] = ppm_allocrow(CSIZE));
-  
-  for (int i = 0; i < RSIZE; i++)
-    for (int j = 0; j < CSIZE; j++) {
-      _Complex double z = LL + j*DX + (RSIZE-i-1)*1.0i*DY;
-      int c = color(z/(2.0-z));
-      switch (c) {
-      case -1:
-	PPM_ASSIGN(array[i][j],2*PPM_MAXMAXVAL/3,2*PPM_MAXMAXVAL/3,2*PPM_MAXMAXVAL/3);
-	break;
-      case -2:
-	PPM_ASSIGN(array[i][j],2*PPM_MAXMAXVAL/3,2*PPM_MAXMAXVAL/3,2*PPM_MAXMAXVAL/3);
-	break;
-      case 0:
-	PPM_ASSIGN(array[i][j],PPM_MAXMAXVAL,PPM_MAXMAXVAL/2,PPM_MAXMAXVAL/2);
-	break;
-      case 1:
-	PPM_ASSIGN(array[i][j],PPM_MAXMAXVAL/2,PPM_MAXMAXVAL,PPM_MAXMAXVAL/2);
-	break;
-      case 2:
-	PPM_ASSIGN(array[i][j],PPM_MAXMAXVAL/2,PPM_MAXMAXVAL/2,PPM_MAXMAXVAL);
-	break;
-      }
-    }
-
-  {
-    FILE *f = popen("convert - avs:-", "w");
-    ppm_writeppm(f,array,CSIZE,RSIZE,PPM_MAXMAXVAL,0);
-    pclose(f);
-  }
-  return 0;
-}
diff --git a/sandbox/wittner/wittner.png b/sandbox/wittner/wittner.png
deleted file mode 100644
index 0a0b64a..0000000
Binary files a/sandbox/wittner/wittner.png and /dev/null differ
diff --git a/sandbox/wittner/xy.png b/sandbox/wittner/xy.png
deleted file mode 100644
index b92204a..0000000
Binary files a/sandbox/wittner/xy.png and /dev/null differ
diff --git a/sandbox/xcui.g b/sandbox/xcui.g
deleted file mode 100644
index 2f998b2..0000000
--- a/sandbox/xcui.g
+++ /dev/null
@@ -1,47 +0,0 @@
-ii := COMPLEX_I;
-
-algrel := function(x,d,n)
-    local p, q, i;
-    
-    x := Rat(x); p := NumeratorRat(x); q := DenominatorRat(x);
-    x := IdentityMat(n+1);
-    for i in [0..n] do Add(x[i+1],p^i*q^(n-i)); od;
-    return LLLReducedBasis(x).basis[1];
-end;
-
-# ai are preimages of infinity, bi of 1, ci of 0.
-
-a2 := 0.500000000000000000000000000000 - 0.439846359796987134487167714627*ii;
-a3 := 1.61268567872451072013417667720 - 0.490182463946729812334860743821*ii;
-a4 := 0.500000000000000000000000000000 - 0.0415300696430258467988035191529*ii;
-a5 := -0.612685678724510720134176677204 - 0.490182463946729812334860743821*ii;
-b2 := -0.127485151459011948734747094655 - 0.991840479188802206853242764751*ii;
-b3 := 0.432359588377624320446470035702 - 0.172536644477962176299255320022*ii;
-b4 := -0.986296566330715829847015755165 - 0.164982069462835473582606346591*ii;
-b5 := 1.99516470514160943250266636145 - 0.796186860797306011242450678339*ii;
-c2 := 1.12748515145901194873474709466 - 0.991840479188802206853242764751*ii;
-c3 := 1.98629656633071582984701575517 - 0.164982069462835473582606346591*ii;
-c4 := 0.567640411622375679553529964298 - 0.172536644477962176299255320022*ii;
-c5 := -0.995164705141609432502666361446 - 0.796186860797306011242450678339*ii;
-l  :=  7.69070477812435423714369570274*ii;
-
-pre := CallFuncList(P1Map,List([infinity,1,0,a4,b4,c3],P1Point));
-
-z := Indeterminate(COMPLEX_FIELD,"z":old);
-#s := (b3-c3)*z+(a3-b3);
-#t := a3*(b3-c3)*z+(a3-b3)*c3;
-s := COMPLEX_1; t := z;
-
-F2 := l*(  s)^4*(t-a2*s)^3*(t-a3*s)^2*(t-a4*s)^2*(t-a5*s)^2;
-G2 := (t-s)^4*(t-b2*s)^3*(t-b3*s)^2*(t-b4*s)^2*(t-b5*s)^2;
-H2 := (t  )^4*(t-c2*s)^3*(t-c3*s)^2*(t-c4*s)^2*(t-c5*s)^2;
-
-delta := Sqrt(Sum(List(CoefficientsOfUnivariatePolynomial(F2-G2+H2),Norm)));
-f := P1MapRational(-H2/F2)*pre;
-m := IMGMachine(f);
-perms := List([1..3],i->PermList(Output(m,i)));
-goal := [(1,3,12,4)(5,9)(6,7)(10,13,11)(2,8),
-         (1,5,13,6)(7,10)(2,3)(8,11,12)(4,9),
-         (1,7,11,2)(3,8)(4,5)(9,12,13)(6,10)];
-change := RepresentativeAction(SymmetricGroup(13),perms,goal,OnTuples);
-newm := ChangeFRMachineBasis(m,change);